diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/__pycache__/release.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/__pycache__/release.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..03c8c6748c01f7393d8f7914e6c645a5c3c7ebb9 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/__pycache__/release.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..58013d2e0377a016d1a21fbf21c344ee76765189 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__init__.py @@ -0,0 +1,3 @@ +from .quaternion import Quaternion + +__all__ = ["Quaternion",] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..adba6897215fec854109373d8ef91ba620fe82fe Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/quaternion.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/quaternion.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..01aa7753acaacca1d1c9023b179680b96dc908c3 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/__pycache__/quaternion.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/quaternion.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/quaternion.py new file mode 100644 index 0000000000000000000000000000000000000000..1bf4b363545128e50294e825461106ef9b41990d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/quaternion.py @@ -0,0 +1,1666 @@ +from sympy.core.numbers import Rational +from sympy.core.singleton import S +from sympy.core.relational import is_eq +from sympy.functions.elementary.complexes import (conjugate, im, re, sign) +from sympy.functions.elementary.exponential import (exp, log as ln) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, asin, atan2) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.simplify.trigsimp import trigsimp +from sympy.integrals.integrals import integrate +from sympy.matrices.dense import MutableDenseMatrix as Matrix +from sympy.core.sympify import sympify, _sympify +from sympy.core.expr import Expr +from sympy.core.logic import fuzzy_not, fuzzy_or +from sympy.utilities.misc import as_int + +from mpmath.libmp.libmpf import prec_to_dps + + +def _check_norm(elements, norm): + """validate if input norm is consistent""" + if norm is not None and norm.is_number: + if norm.is_positive is False: + raise ValueError("Input norm must be positive.") + + numerical = all(i.is_number and i.is_real is True for i in elements) + if numerical and is_eq(norm**2, sum(i**2 for i in elements)) is False: + raise ValueError("Incompatible value for norm.") + + +def _is_extrinsic(seq): + """validate seq and return True if seq is lowercase and False if uppercase""" + if type(seq) != str: + raise ValueError('Expected seq to be a string.') + if len(seq) != 3: + raise ValueError("Expected 3 axes, got `{}`.".format(seq)) + + intrinsic = seq.isupper() + extrinsic = seq.islower() + if not (intrinsic or extrinsic): + raise ValueError("seq must either be fully uppercase (for extrinsic " + "rotations), or fully lowercase, for intrinsic " + "rotations).") + + i, j, k = seq.lower() + if (i == j) or (j == k): + raise ValueError("Consecutive axes must be different") + + bad = set(seq) - set('xyzXYZ') + if bad: + raise ValueError("Expected axes from `seq` to be from " + "['x', 'y', 'z'] or ['X', 'Y', 'Z'], " + "got {}".format(''.join(bad))) + + return extrinsic + + +class Quaternion(Expr): + """Provides basic quaternion operations. + Quaternion objects can be instantiated as ``Quaternion(a, b, c, d)`` + as in $q = a + bi + cj + dk$. + + Parameters + ========== + + norm : None or number + Pre-defined quaternion norm. If a value is given, Quaternion.norm + returns this pre-defined value instead of calculating the norm + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 2, 3, 4) + >>> q + 1 + 2*i + 3*j + 4*k + + Quaternions over complex fields can be defined as: + + >>> from sympy import Quaternion + >>> from sympy import symbols, I + >>> x = symbols('x') + >>> q1 = Quaternion(x, x**3, x, x**2, real_field = False) + >>> q2 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + >>> q1 + x + x**3*i + x*j + x**2*k + >>> q2 + (3 + 4*I) + (2 + 5*I)*i + 0*j + (7 + 8*I)*k + + Defining symbolic unit quaternions: + + >>> from sympy import Quaternion + >>> from sympy.abc import w, x, y, z + >>> q = Quaternion(w, x, y, z, norm=1) + >>> q + w + x*i + y*j + z*k + >>> q.norm() + 1 + + References + ========== + + .. [1] https://www.euclideanspace.com/maths/algebra/realNormedAlgebra/quaternions/ + .. [2] https://en.wikipedia.org/wiki/Quaternion + + """ + _op_priority = 11.0 + + is_commutative = False + + def __new__(cls, a=0, b=0, c=0, d=0, real_field=True, norm=None): + a, b, c, d = map(sympify, (a, b, c, d)) + + if any(i.is_commutative is False for i in [a, b, c, d]): + raise ValueError("arguments have to be commutative") + obj = super().__new__(cls, a, b, c, d) + obj._real_field = real_field + obj.set_norm(norm) + return obj + + def set_norm(self, norm): + """Sets norm of an already instantiated quaternion. + + Parameters + ========== + + norm : None or number + Pre-defined quaternion norm. If a value is given, Quaternion.norm + returns this pre-defined value instead of calculating the norm + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> q = Quaternion(a, b, c, d) + >>> q.norm() + sqrt(a**2 + b**2 + c**2 + d**2) + + Setting the norm: + + >>> q.set_norm(1) + >>> q.norm() + 1 + + Removing set norm: + + >>> q.set_norm(None) + >>> q.norm() + sqrt(a**2 + b**2 + c**2 + d**2) + + """ + norm = sympify(norm) + _check_norm(self.args, norm) + self._norm = norm + + @property + def a(self): + return self.args[0] + + @property + def b(self): + return self.args[1] + + @property + def c(self): + return self.args[2] + + @property + def d(self): + return self.args[3] + + @property + def real_field(self): + return self._real_field + + @property + def product_matrix_left(self): + r"""Returns 4 x 4 Matrix equivalent to a Hamilton product from the + left. This can be useful when treating quaternion elements as column + vectors. Given a quaternion $q = a + bi + cj + dk$ where a, b, c and d + are real numbers, the product matrix from the left is: + + .. math:: + + M = \begin{bmatrix} a &-b &-c &-d \\ + b & a &-d & c \\ + c & d & a &-b \\ + d &-c & b & a \end{bmatrix} + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> q1 = Quaternion(1, 0, 0, 1) + >>> q2 = Quaternion(a, b, c, d) + >>> q1.product_matrix_left + Matrix([ + [1, 0, 0, -1], + [0, 1, -1, 0], + [0, 1, 1, 0], + [1, 0, 0, 1]]) + + >>> q1.product_matrix_left * q2.to_Matrix() + Matrix([ + [a - d], + [b - c], + [b + c], + [a + d]]) + + This is equivalent to: + + >>> (q1 * q2).to_Matrix() + Matrix([ + [a - d], + [b - c], + [b + c], + [a + d]]) + """ + return Matrix([ + [self.a, -self.b, -self.c, -self.d], + [self.b, self.a, -self.d, self.c], + [self.c, self.d, self.a, -self.b], + [self.d, -self.c, self.b, self.a]]) + + @property + def product_matrix_right(self): + r"""Returns 4 x 4 Matrix equivalent to a Hamilton product from the + right. This can be useful when treating quaternion elements as column + vectors. Given a quaternion $q = a + bi + cj + dk$ where a, b, c and d + are real numbers, the product matrix from the left is: + + .. math:: + + M = \begin{bmatrix} a &-b &-c &-d \\ + b & a & d &-c \\ + c &-d & a & b \\ + d & c &-b & a \end{bmatrix} + + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> q1 = Quaternion(a, b, c, d) + >>> q2 = Quaternion(1, 0, 0, 1) + >>> q2.product_matrix_right + Matrix([ + [1, 0, 0, -1], + [0, 1, 1, 0], + [0, -1, 1, 0], + [1, 0, 0, 1]]) + + Note the switched arguments: the matrix represents the quaternion on + the right, but is still considered as a matrix multiplication from the + left. + + >>> q2.product_matrix_right * q1.to_Matrix() + Matrix([ + [ a - d], + [ b + c], + [-b + c], + [ a + d]]) + + This is equivalent to: + + >>> (q1 * q2).to_Matrix() + Matrix([ + [ a - d], + [ b + c], + [-b + c], + [ a + d]]) + """ + return Matrix([ + [self.a, -self.b, -self.c, -self.d], + [self.b, self.a, self.d, -self.c], + [self.c, -self.d, self.a, self.b], + [self.d, self.c, -self.b, self.a]]) + + def to_Matrix(self, vector_only=False): + """Returns elements of quaternion as a column vector. + By default, a ``Matrix`` of length 4 is returned, with the real part as the + first element. + If ``vector_only`` is ``True``, returns only imaginary part as a Matrix of + length 3. + + Parameters + ========== + + vector_only : bool + If True, only imaginary part is returned. + Default value: False + + Returns + ======= + + Matrix + A column vector constructed by the elements of the quaternion. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> q = Quaternion(a, b, c, d) + >>> q + a + b*i + c*j + d*k + + >>> q.to_Matrix() + Matrix([ + [a], + [b], + [c], + [d]]) + + + >>> q.to_Matrix(vector_only=True) + Matrix([ + [b], + [c], + [d]]) + + """ + if vector_only: + return Matrix(self.args[1:]) + else: + return Matrix(self.args) + + @classmethod + def from_Matrix(cls, elements): + """Returns quaternion from elements of a column vector`. + If vector_only is True, returns only imaginary part as a Matrix of + length 3. + + Parameters + ========== + + elements : Matrix, list or tuple of length 3 or 4. If length is 3, + assume real part is zero. + Default value: False + + Returns + ======= + + Quaternion + A quaternion created from the input elements. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> q = Quaternion.from_Matrix([a, b, c, d]) + >>> q + a + b*i + c*j + d*k + + >>> q = Quaternion.from_Matrix([b, c, d]) + >>> q + 0 + b*i + c*j + d*k + + """ + length = len(elements) + if length != 3 and length != 4: + raise ValueError("Input elements must have length 3 or 4, got {} " + "elements".format(length)) + + if length == 3: + return Quaternion(0, *elements) + else: + return Quaternion(*elements) + + @classmethod + def from_euler(cls, angles, seq): + """Returns quaternion equivalent to rotation represented by the Euler + angles, in the sequence defined by ``seq``. + + Parameters + ========== + + angles : list, tuple or Matrix of 3 numbers + The Euler angles (in radians). + seq : string of length 3 + Represents the sequence of rotations. + For extrinsic rotations, seq must be all lowercase and its elements + must be from the set ``{'x', 'y', 'z'}`` + For intrinsic rotations, seq must be all uppercase and its elements + must be from the set ``{'X', 'Y', 'Z'}`` + + Returns + ======= + + Quaternion + The normalized rotation quaternion calculated from the Euler angles + in the given sequence. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import pi + >>> q = Quaternion.from_euler([pi/2, 0, 0], 'xyz') + >>> q + sqrt(2)/2 + sqrt(2)/2*i + 0*j + 0*k + + >>> q = Quaternion.from_euler([0, pi/2, pi] , 'zyz') + >>> q + 0 + (-sqrt(2)/2)*i + 0*j + sqrt(2)/2*k + + >>> q = Quaternion.from_euler([0, pi/2, pi] , 'ZYZ') + >>> q + 0 + sqrt(2)/2*i + 0*j + sqrt(2)/2*k + + """ + + if len(angles) != 3: + raise ValueError("3 angles must be given.") + + extrinsic = _is_extrinsic(seq) + i, j, k = seq.lower() + + # get elementary basis vectors + ei = [1 if n == i else 0 for n in 'xyz'] + ej = [1 if n == j else 0 for n in 'xyz'] + ek = [1 if n == k else 0 for n in 'xyz'] + + # calculate distinct quaternions + qi = cls.from_axis_angle(ei, angles[0]) + qj = cls.from_axis_angle(ej, angles[1]) + qk = cls.from_axis_angle(ek, angles[2]) + + if extrinsic: + return trigsimp(qk * qj * qi) + else: + return trigsimp(qi * qj * qk) + + def to_euler(self, seq, angle_addition=True, avoid_square_root=False): + r"""Returns Euler angles representing same rotation as the quaternion, + in the sequence given by ``seq``. This implements the method described + in [1]_. + + For degenerate cases (gymbal lock cases), the third angle is + set to zero. + + Parameters + ========== + + seq : string of length 3 + Represents the sequence of rotations. + For extrinsic rotations, seq must be all lowercase and its elements + must be from the set ``{'x', 'y', 'z'}`` + For intrinsic rotations, seq must be all uppercase and its elements + must be from the set ``{'X', 'Y', 'Z'}`` + + angle_addition : bool + When True, first and third angles are given as an addition and + subtraction of two simpler ``atan2`` expressions. When False, the + first and third angles are each given by a single more complicated + ``atan2`` expression. This equivalent expression is given by: + + .. math:: + + \operatorname{atan_2} (b,a) \pm \operatorname{atan_2} (d,c) = + \operatorname{atan_2} (bc\pm ad, ac\mp bd) + + Default value: True + + avoid_square_root : bool + When True, the second angle is calculated with an expression based + on ``acos``, which is slightly more complicated but avoids a square + root. When False, second angle is calculated with ``atan2``, which + is simpler and can be better for numerical reasons (some + numerical implementations of ``acos`` have problems near zero). + Default value: False + + + Returns + ======= + + Tuple + The Euler angles calculated from the quaternion + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy.abc import a, b, c, d + >>> euler = Quaternion(a, b, c, d).to_euler('zyz') + >>> euler + (-atan2(-b, c) + atan2(d, a), + 2*atan2(sqrt(b**2 + c**2), sqrt(a**2 + d**2)), + atan2(-b, c) + atan2(d, a)) + + + References + ========== + + .. [1] https://doi.org/10.1371/journal.pone.0276302 + + """ + if self.is_zero_quaternion(): + raise ValueError('Cannot convert a quaternion with norm 0.') + + angles = [0, 0, 0] + + extrinsic = _is_extrinsic(seq) + i, j, k = seq.lower() + + # get index corresponding to elementary basis vectors + i = 'xyz'.index(i) + 1 + j = 'xyz'.index(j) + 1 + k = 'xyz'.index(k) + 1 + + if not extrinsic: + i, k = k, i + + # check if sequence is symmetric + symmetric = i == k + if symmetric: + k = 6 - i - j + + # parity of the permutation + sign = (i - j) * (j - k) * (k - i) // 2 + + # permutate elements + elements = [self.a, self.b, self.c, self.d] + a = elements[0] + b = elements[i] + c = elements[j] + d = elements[k] * sign + + if not symmetric: + a, b, c, d = a - c, b + d, c + a, d - b + + if avoid_square_root: + if symmetric: + n2 = self.norm()**2 + angles[1] = acos((a * a + b * b - c * c - d * d) / n2) + else: + n2 = 2 * self.norm()**2 + angles[1] = asin((c * c + d * d - a * a - b * b) / n2) + else: + angles[1] = 2 * atan2(sqrt(c * c + d * d), sqrt(a * a + b * b)) + if not symmetric: + angles[1] -= S.Pi / 2 + + # Check for singularities in numerical cases + case = 0 + if is_eq(c, S.Zero) and is_eq(d, S.Zero): + case = 1 + if is_eq(a, S.Zero) and is_eq(b, S.Zero): + case = 2 + + if case == 0: + if angle_addition: + angles[0] = atan2(b, a) + atan2(d, c) + angles[2] = atan2(b, a) - atan2(d, c) + else: + angles[0] = atan2(b*c + a*d, a*c - b*d) + angles[2] = atan2(b*c - a*d, a*c + b*d) + + else: # any degenerate case + angles[2 * (not extrinsic)] = S.Zero + if case == 1: + angles[2 * extrinsic] = 2 * atan2(b, a) + else: + angles[2 * extrinsic] = 2 * atan2(d, c) + angles[2 * extrinsic] *= (-1 if extrinsic else 1) + + # for Tait-Bryan angles + if not symmetric: + angles[0] *= sign + + if extrinsic: + return tuple(angles[::-1]) + else: + return tuple(angles) + + @classmethod + def from_axis_angle(cls, vector, angle): + """Returns a rotation quaternion given the axis and the angle of rotation. + + Parameters + ========== + + vector : tuple of three numbers + The vector representation of the given axis. + angle : number + The angle by which axis is rotated (in radians). + + Returns + ======= + + Quaternion + The normalized rotation quaternion calculated from the given axis and the angle of rotation. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import pi, sqrt + >>> q = Quaternion.from_axis_angle((sqrt(3)/3, sqrt(3)/3, sqrt(3)/3), 2*pi/3) + >>> q + 1/2 + 1/2*i + 1/2*j + 1/2*k + + """ + (x, y, z) = vector + norm = sqrt(x**2 + y**2 + z**2) + (x, y, z) = (x / norm, y / norm, z / norm) + s = sin(angle * S.Half) + a = cos(angle * S.Half) + b = x * s + c = y * s + d = z * s + + # note that this quaternion is already normalized by construction: + # c^2 + (s*x)^2 + (s*y)^2 + (s*z)^2 = c^2 + s^2*(x^2 + y^2 + z^2) = c^2 + s^2 * 1 = c^2 + s^2 = 1 + # so, what we return is a normalized quaternion + + return cls(a, b, c, d) + + @classmethod + def from_rotation_matrix(cls, M): + """Returns the equivalent quaternion of a matrix. The quaternion will be normalized + only if the matrix is special orthogonal (orthogonal and det(M) = 1). + + Parameters + ========== + + M : Matrix + Input matrix to be converted to equivalent quaternion. M must be special + orthogonal (orthogonal and det(M) = 1) for the quaternion to be normalized. + + Returns + ======= + + Quaternion + The quaternion equivalent to given matrix. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import Matrix, symbols, cos, sin, trigsimp + >>> x = symbols('x') + >>> M = Matrix([[cos(x), -sin(x), 0], [sin(x), cos(x), 0], [0, 0, 1]]) + >>> q = trigsimp(Quaternion.from_rotation_matrix(M)) + >>> q + sqrt(2)*sqrt(cos(x) + 1)/2 + 0*i + 0*j + sqrt(2 - 2*cos(x))*sign(sin(x))/2*k + + """ + + absQ = M.det()**Rational(1, 3) + + a = sqrt(absQ + M[0, 0] + M[1, 1] + M[2, 2]) / 2 + b = sqrt(absQ + M[0, 0] - M[1, 1] - M[2, 2]) / 2 + c = sqrt(absQ - M[0, 0] + M[1, 1] - M[2, 2]) / 2 + d = sqrt(absQ - M[0, 0] - M[1, 1] + M[2, 2]) / 2 + + b = b * sign(M[2, 1] - M[1, 2]) + c = c * sign(M[0, 2] - M[2, 0]) + d = d * sign(M[1, 0] - M[0, 1]) + + return Quaternion(a, b, c, d) + + def __add__(self, other): + return self.add(other) + + def __radd__(self, other): + return self.add(other) + + def __sub__(self, other): + return self.add(other*-1) + + def __mul__(self, other): + return self._generic_mul(self, _sympify(other)) + + def __rmul__(self, other): + return self._generic_mul(_sympify(other), self) + + def __pow__(self, p): + return self.pow(p) + + def __neg__(self): + return Quaternion(-self.a, -self.b, -self.c, -self.d) + + def __truediv__(self, other): + return self * sympify(other)**-1 + + def __rtruediv__(self, other): + return sympify(other) * self**-1 + + def _eval_Integral(self, *args): + return self.integrate(*args) + + def diff(self, *symbols, **kwargs): + kwargs.setdefault('evaluate', True) + return self.func(*[a.diff(*symbols, **kwargs) for a in self.args]) + + def add(self, other): + """Adds quaternions. + + Parameters + ========== + + other : Quaternion + The quaternion to add to current (self) quaternion. + + Returns + ======= + + Quaternion + The resultant quaternion after adding self to other + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import symbols + >>> q1 = Quaternion(1, 2, 3, 4) + >>> q2 = Quaternion(5, 6, 7, 8) + >>> q1.add(q2) + 6 + 8*i + 10*j + 12*k + >>> q1 + 5 + 6 + 2*i + 3*j + 4*k + >>> x = symbols('x', real = True) + >>> q1.add(x) + (x + 1) + 2*i + 3*j + 4*k + + Quaternions over complex fields : + + >>> from sympy import Quaternion + >>> from sympy import I + >>> q3 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + >>> q3.add(2 + 3*I) + (5 + 7*I) + (2 + 5*I)*i + 0*j + (7 + 8*I)*k + + """ + q1 = self + q2 = sympify(other) + + # If q2 is a number or a SymPy expression instead of a quaternion + if not isinstance(q2, Quaternion): + if q1.real_field and q2.is_complex: + return Quaternion(re(q2) + q1.a, im(q2) + q1.b, q1.c, q1.d) + elif q2.is_commutative: + return Quaternion(q1.a + q2, q1.b, q1.c, q1.d) + else: + raise ValueError("Only commutative expressions can be added with a Quaternion.") + + return Quaternion(q1.a + q2.a, q1.b + q2.b, q1.c + q2.c, q1.d + + q2.d) + + def mul(self, other): + """Multiplies quaternions. + + Parameters + ========== + + other : Quaternion or symbol + The quaternion to multiply to current (self) quaternion. + + Returns + ======= + + Quaternion + The resultant quaternion after multiplying self with other + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import symbols + >>> q1 = Quaternion(1, 2, 3, 4) + >>> q2 = Quaternion(5, 6, 7, 8) + >>> q1.mul(q2) + (-60) + 12*i + 30*j + 24*k + >>> q1.mul(2) + 2 + 4*i + 6*j + 8*k + >>> x = symbols('x', real = True) + >>> q1.mul(x) + x + 2*x*i + 3*x*j + 4*x*k + + Quaternions over complex fields : + + >>> from sympy import Quaternion + >>> from sympy import I + >>> q3 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + >>> q3.mul(2 + 3*I) + (2 + 3*I)*(3 + 4*I) + (2 + 3*I)*(2 + 5*I)*i + 0*j + (2 + 3*I)*(7 + 8*I)*k + + """ + return self._generic_mul(self, _sympify(other)) + + @staticmethod + def _generic_mul(q1, q2): + """Generic multiplication. + + Parameters + ========== + + q1 : Quaternion or symbol + q2 : Quaternion or symbol + + It is important to note that if neither q1 nor q2 is a Quaternion, + this function simply returns q1 * q2. + + Returns + ======= + + Quaternion + The resultant quaternion after multiplying q1 and q2 + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import Symbol, S + >>> q1 = Quaternion(1, 2, 3, 4) + >>> q2 = Quaternion(5, 6, 7, 8) + >>> Quaternion._generic_mul(q1, q2) + (-60) + 12*i + 30*j + 24*k + >>> Quaternion._generic_mul(q1, S(2)) + 2 + 4*i + 6*j + 8*k + >>> x = Symbol('x', real = True) + >>> Quaternion._generic_mul(q1, x) + x + 2*x*i + 3*x*j + 4*x*k + + Quaternions over complex fields : + + >>> from sympy import I + >>> q3 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + >>> Quaternion._generic_mul(q3, 2 + 3*I) + (2 + 3*I)*(3 + 4*I) + (2 + 3*I)*(2 + 5*I)*i + 0*j + (2 + 3*I)*(7 + 8*I)*k + + """ + # None is a Quaternion: + if not isinstance(q1, Quaternion) and not isinstance(q2, Quaternion): + return q1 * q2 + + # If q1 is a number or a SymPy expression instead of a quaternion + if not isinstance(q1, Quaternion): + if q2.real_field and q1.is_complex: + return Quaternion(re(q1), im(q1), 0, 0) * q2 + elif q1.is_commutative: + return Quaternion(q1 * q2.a, q1 * q2.b, q1 * q2.c, q1 * q2.d) + else: + raise ValueError("Only commutative expressions can be multiplied with a Quaternion.") + + # If q2 is a number or a SymPy expression instead of a quaternion + if not isinstance(q2, Quaternion): + if q1.real_field and q2.is_complex: + return q1 * Quaternion(re(q2), im(q2), 0, 0) + elif q2.is_commutative: + return Quaternion(q2 * q1.a, q2 * q1.b, q2 * q1.c, q2 * q1.d) + else: + raise ValueError("Only commutative expressions can be multiplied with a Quaternion.") + + # If any of the quaternions has a fixed norm, pre-compute norm + if q1._norm is None and q2._norm is None: + norm = None + else: + norm = q1.norm() * q2.norm() + + return Quaternion(-q1.b*q2.b - q1.c*q2.c - q1.d*q2.d + q1.a*q2.a, + q1.b*q2.a + q1.c*q2.d - q1.d*q2.c + q1.a*q2.b, + -q1.b*q2.d + q1.c*q2.a + q1.d*q2.b + q1.a*q2.c, + q1.b*q2.c - q1.c*q2.b + q1.d*q2.a + q1.a * q2.d, + norm=norm) + + def _eval_conjugate(self): + """Returns the conjugate of the quaternion.""" + q = self + return Quaternion(q.a, -q.b, -q.c, -q.d, norm=q._norm) + + def norm(self): + """Returns the norm of the quaternion.""" + if self._norm is None: # check if norm is pre-defined + q = self + # trigsimp is used to simplify sin(x)^2 + cos(x)^2 (these terms + # arise when from_axis_angle is used). + return sqrt(trigsimp(q.a**2 + q.b**2 + q.c**2 + q.d**2)) + + return self._norm + + def normalize(self): + """Returns the normalized form of the quaternion.""" + q = self + return q * (1/q.norm()) + + def inverse(self): + """Returns the inverse of the quaternion.""" + q = self + if not q.norm(): + raise ValueError("Cannot compute inverse for a quaternion with zero norm") + return conjugate(q) * (1/q.norm()**2) + + def pow(self, p): + """Finds the pth power of the quaternion. + + Parameters + ========== + + p : int + Power to be applied on quaternion. + + Returns + ======= + + Quaternion + Returns the p-th power of the current quaternion. + Returns the inverse if p = -1. + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 2, 3, 4) + >>> q.pow(4) + 668 + (-224)*i + (-336)*j + (-448)*k + + """ + try: + q, p = self, as_int(p) + except ValueError: + return NotImplemented + + if p < 0: + q, p = q.inverse(), -p + + if p == 1: + return q + + res = Quaternion(1, 0, 0, 0) + while p > 0: + if p & 1: + res *= q + q *= q + p >>= 1 + + return res + + def exp(self): + """Returns the exponential of $q$, given by $e^q$. + + Returns + ======= + + Quaternion + The exponential of the quaternion. + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 2, 3, 4) + >>> q.exp() + E*cos(sqrt(29)) + + 2*sqrt(29)*E*sin(sqrt(29))/29*i + + 3*sqrt(29)*E*sin(sqrt(29))/29*j + + 4*sqrt(29)*E*sin(sqrt(29))/29*k + + """ + # exp(q) = e^a(cos||v|| + v/||v||*sin||v||) + q = self + vector_norm = sqrt(q.b**2 + q.c**2 + q.d**2) + a = exp(q.a) * cos(vector_norm) + b = exp(q.a) * sin(vector_norm) * q.b / vector_norm + c = exp(q.a) * sin(vector_norm) * q.c / vector_norm + d = exp(q.a) * sin(vector_norm) * q.d / vector_norm + + return Quaternion(a, b, c, d) + + def log(self): + r"""Returns the logarithm of the quaternion, given by $\log q$. + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 2, 3, 4) + >>> q.log() + log(sqrt(30)) + + 2*sqrt(29)*acos(sqrt(30)/30)/29*i + + 3*sqrt(29)*acos(sqrt(30)/30)/29*j + + 4*sqrt(29)*acos(sqrt(30)/30)/29*k + + """ + # log(q) = log||q|| + v/||v||*arccos(a/||q||) + q = self + vector_norm = sqrt(q.b**2 + q.c**2 + q.d**2) + q_norm = q.norm() + a = ln(q_norm) + b = q.b * acos(q.a / q_norm) / vector_norm + c = q.c * acos(q.a / q_norm) / vector_norm + d = q.d * acos(q.a / q_norm) / vector_norm + + return Quaternion(a, b, c, d) + + def _eval_subs(self, *args): + elements = [i.subs(*args) for i in self.args] + norm = self._norm + if norm is not None: + norm = norm.subs(*args) + _check_norm(elements, norm) + return Quaternion(*elements, norm=norm) + + def _eval_evalf(self, prec): + """Returns the floating point approximations (decimal numbers) of the quaternion. + + Returns + ======= + + Quaternion + Floating point approximations of quaternion(self) + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import sqrt + >>> q = Quaternion(1/sqrt(1), 1/sqrt(2), 1/sqrt(3), 1/sqrt(4)) + >>> q.evalf() + 1.00000000000000 + + 0.707106781186547*i + + 0.577350269189626*j + + 0.500000000000000*k + + """ + nprec = prec_to_dps(prec) + return Quaternion(*[arg.evalf(n=nprec) for arg in self.args]) + + def pow_cos_sin(self, p): + """Computes the pth power in the cos-sin form. + + Parameters + ========== + + p : int + Power to be applied on quaternion. + + Returns + ======= + + Quaternion + The p-th power in the cos-sin form. + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 2, 3, 4) + >>> q.pow_cos_sin(4) + 900*cos(4*acos(sqrt(30)/30)) + + 1800*sqrt(29)*sin(4*acos(sqrt(30)/30))/29*i + + 2700*sqrt(29)*sin(4*acos(sqrt(30)/30))/29*j + + 3600*sqrt(29)*sin(4*acos(sqrt(30)/30))/29*k + + """ + # q = ||q||*(cos(a) + u*sin(a)) + # q^p = ||q||^p * (cos(p*a) + u*sin(p*a)) + + q = self + (v, angle) = q.to_axis_angle() + q2 = Quaternion.from_axis_angle(v, p * angle) + return q2 * (q.norm()**p) + + def integrate(self, *args): + """Computes integration of quaternion. + + Returns + ======= + + Quaternion + Integration of the quaternion(self) with the given variable. + + Examples + ======== + + Indefinite Integral of quaternion : + + >>> from sympy import Quaternion + >>> from sympy.abc import x + >>> q = Quaternion(1, 2, 3, 4) + >>> q.integrate(x) + x + 2*x*i + 3*x*j + 4*x*k + + Definite integral of quaternion : + + >>> from sympy import Quaternion + >>> from sympy.abc import x + >>> q = Quaternion(1, 2, 3, 4) + >>> q.integrate((x, 1, 5)) + 4 + 8*i + 12*j + 16*k + + """ + return Quaternion(integrate(self.a, *args), integrate(self.b, *args), + integrate(self.c, *args), integrate(self.d, *args)) + + @staticmethod + def rotate_point(pin, r): + """Returns the coordinates of the point pin (a 3 tuple) after rotation. + + Parameters + ========== + + pin : tuple + A 3-element tuple of coordinates of a point which needs to be + rotated. + r : Quaternion or tuple + Axis and angle of rotation. + + It's important to note that when r is a tuple, it must be of the form + (axis, angle) + + Returns + ======= + + tuple + The coordinates of the point after rotation. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import symbols, trigsimp, cos, sin + >>> x = symbols('x') + >>> q = Quaternion(cos(x/2), 0, 0, sin(x/2)) + >>> trigsimp(Quaternion.rotate_point((1, 1, 1), q)) + (sqrt(2)*cos(x + pi/4), sqrt(2)*sin(x + pi/4), 1) + >>> (axis, angle) = q.to_axis_angle() + >>> trigsimp(Quaternion.rotate_point((1, 1, 1), (axis, angle))) + (sqrt(2)*cos(x + pi/4), sqrt(2)*sin(x + pi/4), 1) + + """ + if isinstance(r, tuple): + # if r is of the form (vector, angle) + q = Quaternion.from_axis_angle(r[0], r[1]) + else: + # if r is a quaternion + q = r.normalize() + pout = q * Quaternion(0, pin[0], pin[1], pin[2]) * conjugate(q) + return (pout.b, pout.c, pout.d) + + def to_axis_angle(self): + """Returns the axis and angle of rotation of a quaternion. + + Returns + ======= + + tuple + Tuple of (axis, angle) + + Examples + ======== + + >>> from sympy import Quaternion + >>> q = Quaternion(1, 1, 1, 1) + >>> (axis, angle) = q.to_axis_angle() + >>> axis + (sqrt(3)/3, sqrt(3)/3, sqrt(3)/3) + >>> angle + 2*pi/3 + + """ + q = self + if q.a.is_negative: + q = q * -1 + + q = q.normalize() + angle = trigsimp(2 * acos(q.a)) + + # Since quaternion is normalised, q.a is less than 1. + s = sqrt(1 - q.a*q.a) + + x = trigsimp(q.b / s) + y = trigsimp(q.c / s) + z = trigsimp(q.d / s) + + v = (x, y, z) + t = (v, angle) + + return t + + def to_rotation_matrix(self, v=None, homogeneous=True): + """Returns the equivalent rotation transformation matrix of the quaternion + which represents rotation about the origin if ``v`` is not passed. + + Parameters + ========== + + v : tuple or None + Default value: None + homogeneous : bool + When True, gives an expression that may be more efficient for + symbolic calculations but less so for direct evaluation. Both + formulas are mathematically equivalent. + Default value: True + + Returns + ======= + + tuple + Returns the equivalent rotation transformation matrix of the quaternion + which represents rotation about the origin if v is not passed. + + Examples + ======== + + >>> from sympy import Quaternion + >>> from sympy import symbols, trigsimp, cos, sin + >>> x = symbols('x') + >>> q = Quaternion(cos(x/2), 0, 0, sin(x/2)) + >>> trigsimp(q.to_rotation_matrix()) + Matrix([ + [cos(x), -sin(x), 0], + [sin(x), cos(x), 0], + [ 0, 0, 1]]) + + Generates a 4x4 transformation matrix (used for rotation about a point + other than the origin) if the point(v) is passed as an argument. + """ + + q = self + s = q.norm()**-2 + + # diagonal elements are different according to parameter normal + if homogeneous: + m00 = s*(q.a**2 + q.b**2 - q.c**2 - q.d**2) + m11 = s*(q.a**2 - q.b**2 + q.c**2 - q.d**2) + m22 = s*(q.a**2 - q.b**2 - q.c**2 + q.d**2) + else: + m00 = 1 - 2*s*(q.c**2 + q.d**2) + m11 = 1 - 2*s*(q.b**2 + q.d**2) + m22 = 1 - 2*s*(q.b**2 + q.c**2) + + m01 = 2*s*(q.b*q.c - q.d*q.a) + m02 = 2*s*(q.b*q.d + q.c*q.a) + + m10 = 2*s*(q.b*q.c + q.d*q.a) + m12 = 2*s*(q.c*q.d - q.b*q.a) + + m20 = 2*s*(q.b*q.d - q.c*q.a) + m21 = 2*s*(q.c*q.d + q.b*q.a) + + if not v: + return Matrix([[m00, m01, m02], [m10, m11, m12], [m20, m21, m22]]) + + else: + (x, y, z) = v + + m03 = x - x*m00 - y*m01 - z*m02 + m13 = y - x*m10 - y*m11 - z*m12 + m23 = z - x*m20 - y*m21 - z*m22 + m30 = m31 = m32 = 0 + m33 = 1 + + return Matrix([[m00, m01, m02, m03], [m10, m11, m12, m13], + [m20, m21, m22, m23], [m30, m31, m32, m33]]) + + def scalar_part(self): + r"""Returns scalar part($\mathbf{S}(q)$) of the quaternion q. + + Explanation + =========== + + Given a quaternion $q = a + bi + cj + dk$, returns $\mathbf{S}(q) = a$. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(4, 8, 13, 12) + >>> q.scalar_part() + 4 + + """ + + return self.a + + def vector_part(self): + r""" + Returns $\mathbf{V}(q)$, the vector part of the quaternion $q$. + + Explanation + =========== + + Given a quaternion $q = a + bi + cj + dk$, returns $\mathbf{V}(q) = bi + cj + dk$. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(1, 1, 1, 1) + >>> q.vector_part() + 0 + 1*i + 1*j + 1*k + + >>> q = Quaternion(4, 8, 13, 12) + >>> q.vector_part() + 0 + 8*i + 13*j + 12*k + + """ + + return Quaternion(0, self.b, self.c, self.d) + + def axis(self): + r""" + Returns $\mathbf{Ax}(q)$, the axis of the quaternion $q$. + + Explanation + =========== + + Given a quaternion $q = a + bi + cj + dk$, returns $\mathbf{Ax}(q)$ i.e., the versor of the vector part of that quaternion + equal to $\mathbf{U}[\mathbf{V}(q)]$. + The axis is always an imaginary unit with square equal to $-1 + 0i + 0j + 0k$. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(1, 1, 1, 1) + >>> q.axis() + 0 + sqrt(3)/3*i + sqrt(3)/3*j + sqrt(3)/3*k + + See Also + ======== + + vector_part + + """ + axis = self.vector_part().normalize() + + return Quaternion(0, axis.b, axis.c, axis.d) + + def is_pure(self): + """ + Returns true if the quaternion is pure, false if the quaternion is not pure + or returns none if it is unknown. + + Explanation + =========== + + A pure quaternion (also a vector quaternion) is a quaternion with scalar + part equal to 0. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(0, 8, 13, 12) + >>> q.is_pure() + True + + See Also + ======== + scalar_part + + """ + + return self.a.is_zero + + def is_zero_quaternion(self): + """ + Returns true if the quaternion is a zero quaternion or false if it is not a zero quaternion + and None if the value is unknown. + + Explanation + =========== + + A zero quaternion is a quaternion with both scalar part and + vector part equal to 0. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(1, 0, 0, 0) + >>> q.is_zero_quaternion() + False + + >>> q = Quaternion(0, 0, 0, 0) + >>> q.is_zero_quaternion() + True + + See Also + ======== + scalar_part + vector_part + + """ + + return self.norm().is_zero + + def angle(self): + r""" + Returns the angle of the quaternion measured in the real-axis plane. + + Explanation + =========== + + Given a quaternion $q = a + bi + cj + dk$ where $a$, $b$, $c$ and $d$ + are real numbers, returns the angle of the quaternion given by + + .. math:: + \theta := 2 \operatorname{atan_2}\left(\sqrt{b^2 + c^2 + d^2}, {a}\right) + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(1, 4, 4, 4) + >>> q.angle() + 2*atan(4*sqrt(3)) + + """ + + return 2 * atan2(self.vector_part().norm(), self.scalar_part()) + + + def arc_coplanar(self, other): + """ + Returns True if the transformation arcs represented by the input quaternions happen in the same plane. + + Explanation + =========== + + Two quaternions are said to be coplanar (in this arc sense) when their axes are parallel. + The plane of a quaternion is the one normal to its axis. + + Parameters + ========== + + other : a Quaternion + + Returns + ======= + + True : if the planes of the two quaternions are the same, apart from its orientation/sign. + False : if the planes of the two quaternions are not the same, apart from its orientation/sign. + None : if plane of either of the quaternion is unknown. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q1 = Quaternion(1, 4, 4, 4) + >>> q2 = Quaternion(3, 8, 8, 8) + >>> Quaternion.arc_coplanar(q1, q2) + True + + >>> q1 = Quaternion(2, 8, 13, 12) + >>> Quaternion.arc_coplanar(q1, q2) + False + + See Also + ======== + + vector_coplanar + is_pure + + """ + if (self.is_zero_quaternion()) or (other.is_zero_quaternion()): + raise ValueError('Neither of the given quaternions can be 0') + + return fuzzy_or([(self.axis() - other.axis()).is_zero_quaternion(), (self.axis() + other.axis()).is_zero_quaternion()]) + + @classmethod + def vector_coplanar(cls, q1, q2, q3): + r""" + Returns True if the axis of the pure quaternions seen as 3D vectors + ``q1``, ``q2``, and ``q3`` are coplanar. + + Explanation + =========== + + Three pure quaternions are vector coplanar if the quaternions seen as 3D vectors are coplanar. + + Parameters + ========== + + q1 + A pure Quaternion. + q2 + A pure Quaternion. + q3 + A pure Quaternion. + + Returns + ======= + + True : if the axis of the pure quaternions seen as 3D vectors + q1, q2, and q3 are coplanar. + False : if the axis of the pure quaternions seen as 3D vectors + q1, q2, and q3 are not coplanar. + None : if the axis of the pure quaternions seen as 3D vectors + q1, q2, and q3 are coplanar is unknown. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q1 = Quaternion(0, 4, 4, 4) + >>> q2 = Quaternion(0, 8, 8, 8) + >>> q3 = Quaternion(0, 24, 24, 24) + >>> Quaternion.vector_coplanar(q1, q2, q3) + True + + >>> q1 = Quaternion(0, 8, 16, 8) + >>> q2 = Quaternion(0, 8, 3, 12) + >>> Quaternion.vector_coplanar(q1, q2, q3) + False + + See Also + ======== + + axis + is_pure + + """ + + if fuzzy_not(q1.is_pure()) or fuzzy_not(q2.is_pure()) or fuzzy_not(q3.is_pure()): + raise ValueError('The given quaternions must be pure') + + M = Matrix([[q1.b, q1.c, q1.d], [q2.b, q2.c, q2.d], [q3.b, q3.c, q3.d]]).det() + return M.is_zero + + def parallel(self, other): + """ + Returns True if the two pure quaternions seen as 3D vectors are parallel. + + Explanation + =========== + + Two pure quaternions are called parallel when their vector product is commutative which + implies that the quaternions seen as 3D vectors have same direction. + + Parameters + ========== + + other : a Quaternion + + Returns + ======= + + True : if the two pure quaternions seen as 3D vectors are parallel. + False : if the two pure quaternions seen as 3D vectors are not parallel. + None : if the two pure quaternions seen as 3D vectors are parallel is unknown. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(0, 4, 4, 4) + >>> q1 = Quaternion(0, 8, 8, 8) + >>> q.parallel(q1) + True + + >>> q1 = Quaternion(0, 8, 13, 12) + >>> q.parallel(q1) + False + + """ + + if fuzzy_not(self.is_pure()) or fuzzy_not(other.is_pure()): + raise ValueError('The provided quaternions must be pure') + + return (self*other - other*self).is_zero_quaternion() + + def orthogonal(self, other): + """ + Returns the orthogonality of two quaternions. + + Explanation + =========== + + Two pure quaternions are called orthogonal when their product is anti-commutative. + + Parameters + ========== + + other : a Quaternion + + Returns + ======= + + True : if the two pure quaternions seen as 3D vectors are orthogonal. + False : if the two pure quaternions seen as 3D vectors are not orthogonal. + None : if the two pure quaternions seen as 3D vectors are orthogonal is unknown. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(0, 4, 4, 4) + >>> q1 = Quaternion(0, 8, 8, 8) + >>> q.orthogonal(q1) + False + + >>> q1 = Quaternion(0, 2, 2, 0) + >>> q = Quaternion(0, 2, -2, 0) + >>> q.orthogonal(q1) + True + + """ + + if fuzzy_not(self.is_pure()) or fuzzy_not(other.is_pure()): + raise ValueError('The given quaternions must be pure') + + return (self*other + other*self).is_zero_quaternion() + + def index_vector(self): + r""" + Returns the index vector of the quaternion. + + Explanation + =========== + + The index vector is given by $\mathbf{T}(q)$, the norm (or magnitude) of + the quaternion $q$, multiplied by $\mathbf{Ax}(q)$, the axis of $q$. + + Returns + ======= + + Quaternion: representing index vector of the provided quaternion. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(2, 4, 2, 4) + >>> q.index_vector() + 0 + 4*sqrt(10)/3*i + 2*sqrt(10)/3*j + 4*sqrt(10)/3*k + + See Also + ======== + + axis + norm + + """ + + return self.norm() * self.axis() + + def mensor(self): + """ + Returns the natural logarithm of the norm(magnitude) of the quaternion. + + Examples + ======== + + >>> from sympy.algebras.quaternion import Quaternion + >>> q = Quaternion(2, 4, 2, 4) + >>> q.mensor() + log(2*sqrt(10)) + >>> q.norm() + 2*sqrt(10) + + See Also + ======== + + norm + + """ + + return ln(self.norm()) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/tests/test_quaternion.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/tests/test_quaternion.py new file mode 100644 index 0000000000000000000000000000000000000000..a4331cd6afa05c96e8e11d59df4b7520e4810930 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/algebras/tests/test_quaternion.py @@ -0,0 +1,437 @@ +from sympy.testing.pytest import slow +from sympy.core.function import diff +from sympy.core.function import expand +from sympy.core.numbers import (E, I, Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (Abs, conjugate, im, re, sign) +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, asin, cos, sin, atan2, atan) +from sympy.integrals.integrals import integrate +from sympy.matrices.dense import Matrix +from sympy.simplify import simplify +from sympy.simplify.trigsimp import trigsimp +from sympy.algebras.quaternion import Quaternion +from sympy.testing.pytest import raises +import math +from itertools import permutations, product + +w, x, y, z = symbols('w:z') +phi = symbols('phi') + +def test_quaternion_construction(): + q = Quaternion(w, x, y, z) + assert q + q == Quaternion(2*w, 2*x, 2*y, 2*z) + + q2 = Quaternion.from_axis_angle((sqrt(3)/3, sqrt(3)/3, sqrt(3)/3), + pi*Rational(2, 3)) + assert q2 == Quaternion(S.Half, S.Half, + S.Half, S.Half) + + M = Matrix([[cos(phi), -sin(phi), 0], [sin(phi), cos(phi), 0], [0, 0, 1]]) + q3 = trigsimp(Quaternion.from_rotation_matrix(M)) + assert q3 == Quaternion( + sqrt(2)*sqrt(cos(phi) + 1)/2, 0, 0, sqrt(2 - 2*cos(phi))*sign(sin(phi))/2) + + nc = Symbol('nc', commutative=False) + raises(ValueError, lambda: Quaternion(w, x, nc, z)) + + +def test_quaternion_construction_norm(): + q1 = Quaternion(*symbols('a:d')) + + q2 = Quaternion(w, x, y, z) + assert expand((q1*q2).norm()**2 - (q1.norm()**2 * q2.norm()**2)) == 0 + + q3 = Quaternion(w, x, y, z, norm=1) + assert (q1 * q3).norm() == q1.norm() + + +def test_issue_25254(): + # calculating the inverse cached the norm which caused problems + # when multiplying + p = Quaternion(1, 0, 0, 0) + q = Quaternion.from_axis_angle((1, 1, 1), 3 * math.pi/4) + qi = q.inverse() # this operation cached the norm + test = q * p * qi + assert ((test - p).norm() < 1E-10) + + +def test_to_and_from_Matrix(): + q = Quaternion(w, x, y, z) + q_full = Quaternion.from_Matrix(q.to_Matrix()) + q_vect = Quaternion.from_Matrix(q.to_Matrix(True)) + assert (q - q_full).is_zero_quaternion() + assert (q.vector_part() - q_vect).is_zero_quaternion() + + +def test_product_matrices(): + q1 = Quaternion(w, x, y, z) + q2 = Quaternion(*(symbols("a:d"))) + assert (q1 * q2).to_Matrix() == q1.product_matrix_left * q2.to_Matrix() + assert (q1 * q2).to_Matrix() == q2.product_matrix_right * q1.to_Matrix() + + R1 = (q1.product_matrix_left * q1.product_matrix_right.T)[1:, 1:] + R2 = simplify(q1.to_rotation_matrix()*q1.norm()**2) + assert R1 == R2 + + +def test_quaternion_axis_angle(): + + test_data = [ # axis, angle, expected_quaternion + ((1, 0, 0), 0, (1, 0, 0, 0)), + ((1, 0, 0), pi/2, (sqrt(2)/2, sqrt(2)/2, 0, 0)), + ((0, 1, 0), pi/2, (sqrt(2)/2, 0, sqrt(2)/2, 0)), + ((0, 0, 1), pi/2, (sqrt(2)/2, 0, 0, sqrt(2)/2)), + ((1, 0, 0), pi, (0, 1, 0, 0)), + ((0, 1, 0), pi, (0, 0, 1, 0)), + ((0, 0, 1), pi, (0, 0, 0, 1)), + ((1, 1, 1), pi, (0, 1/sqrt(3),1/sqrt(3),1/sqrt(3))), + ((sqrt(3)/3, sqrt(3)/3, sqrt(3)/3), pi*2/3, (S.Half, S.Half, S.Half, S.Half)) + ] + + for axis, angle, expected in test_data: + assert Quaternion.from_axis_angle(axis, angle) == Quaternion(*expected) + + +def test_quaternion_axis_angle_simplification(): + result = Quaternion.from_axis_angle((1, 2, 3), asin(4)) + assert result.a == cos(asin(4)/2) + assert result.b == sqrt(14)*sin(asin(4)/2)/14 + assert result.c == sqrt(14)*sin(asin(4)/2)/7 + assert result.d == 3*sqrt(14)*sin(asin(4)/2)/14 + +def test_quaternion_complex_real_addition(): + a = symbols("a", complex=True) + b = symbols("b", real=True) + # This symbol is not complex: + c = symbols("c", commutative=False) + + q = Quaternion(w, x, y, z) + assert a + q == Quaternion(w + re(a), x + im(a), y, z) + assert 1 + q == Quaternion(1 + w, x, y, z) + assert I + q == Quaternion(w, 1 + x, y, z) + assert b + q == Quaternion(w + b, x, y, z) + raises(ValueError, lambda: c + q) + raises(ValueError, lambda: q * c) + raises(ValueError, lambda: c * q) + + assert -q == Quaternion(-w, -x, -y, -z) + + q1 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + q2 = Quaternion(1, 4, 7, 8) + + assert q1 + (2 + 3*I) == Quaternion(5 + 7*I, 2 + 5*I, 0, 7 + 8*I) + assert q2 + (2 + 3*I) == Quaternion(3, 7, 7, 8) + assert q1 * (2 + 3*I) == \ + Quaternion((2 + 3*I)*(3 + 4*I), (2 + 3*I)*(2 + 5*I), 0, (2 + 3*I)*(7 + 8*I)) + assert q2 * (2 + 3*I) == Quaternion(-10, 11, 38, -5) + + q1 = Quaternion(1, 2, 3, 4) + q0 = Quaternion(0, 0, 0, 0) + assert q1 + q0 == q1 + assert q1 - q0 == q1 + assert q1 - q1 == q0 + + +def test_quaternion_subs(): + q = Quaternion.from_axis_angle((0, 0, 1), phi) + assert q.subs(phi, 0) == Quaternion(1, 0, 0, 0) + + +def test_quaternion_evalf(): + assert (Quaternion(sqrt(2), 0, 0, sqrt(3)).evalf() == + Quaternion(sqrt(2).evalf(), 0, 0, sqrt(3).evalf())) + assert (Quaternion(1/sqrt(2), 0, 0, 1/sqrt(2)).evalf() == + Quaternion((1/sqrt(2)).evalf(), 0, 0, (1/sqrt(2)).evalf())) + + +def test_quaternion_functions(): + q = Quaternion(w, x, y, z) + q1 = Quaternion(1, 2, 3, 4) + q0 = Quaternion(0, 0, 0, 0) + + assert conjugate(q) == Quaternion(w, -x, -y, -z) + assert q.norm() == sqrt(w**2 + x**2 + y**2 + z**2) + assert q.normalize() == Quaternion(w, x, y, z) / sqrt(w**2 + x**2 + y**2 + z**2) + assert q.inverse() == Quaternion(w, -x, -y, -z) / (w**2 + x**2 + y**2 + z**2) + assert q.inverse() == q.pow(-1) + raises(ValueError, lambda: q0.inverse()) + assert q.pow(2) == Quaternion(w**2 - x**2 - y**2 - z**2, 2*w*x, 2*w*y, 2*w*z) + assert q**(2) == Quaternion(w**2 - x**2 - y**2 - z**2, 2*w*x, 2*w*y, 2*w*z) + assert q1.pow(-2) == Quaternion( + Rational(-7, 225), Rational(-1, 225), Rational(-1, 150), Rational(-2, 225)) + assert q1**(-2) == Quaternion( + Rational(-7, 225), Rational(-1, 225), Rational(-1, 150), Rational(-2, 225)) + assert q1.pow(-0.5) == NotImplemented + raises(TypeError, lambda: q1**(-0.5)) + + assert q1.exp() == \ + Quaternion(E * cos(sqrt(29)), + 2 * sqrt(29) * E * sin(sqrt(29)) / 29, + 3 * sqrt(29) * E * sin(sqrt(29)) / 29, + 4 * sqrt(29) * E * sin(sqrt(29)) / 29) + assert q1.log() == \ + Quaternion(log(sqrt(30)), + 2 * sqrt(29) * acos(sqrt(30)/30) / 29, + 3 * sqrt(29) * acos(sqrt(30)/30) / 29, + 4 * sqrt(29) * acos(sqrt(30)/30) / 29) + + assert q1.pow_cos_sin(2) == \ + Quaternion(30 * cos(2 * acos(sqrt(30)/30)), + 60 * sqrt(29) * sin(2 * acos(sqrt(30)/30)) / 29, + 90 * sqrt(29) * sin(2 * acos(sqrt(30)/30)) / 29, + 120 * sqrt(29) * sin(2 * acos(sqrt(30)/30)) / 29) + + assert diff(Quaternion(x, x, x, x), x) == Quaternion(1, 1, 1, 1) + + assert integrate(Quaternion(x, x, x, x), x) == \ + Quaternion(x**2 / 2, x**2 / 2, x**2 / 2, x**2 / 2) + + assert Quaternion(1, x, x**2, x**3).integrate(x) == \ + Quaternion(x, x**2/2, x**3/3, x**4/4) + + assert Quaternion(sin(x), cos(x), sin(2*x), cos(2*x)).integrate(x) == \ + Quaternion(-cos(x), sin(x), -cos(2*x)/2, sin(2*x)/2) + + assert Quaternion(x**2, y**2, z**2, x*y*z).integrate(x, y) == \ + Quaternion(x**3*y/3, x*y**3/3, x*y*z**2, x**2*y**2*z/4) + + assert Quaternion.rotate_point((1, 1, 1), q1) == (S.One / 5, 1, S(7) / 5) + n = Symbol('n') + raises(TypeError, lambda: q1**n) + n = Symbol('n', integer=True) + raises(TypeError, lambda: q1**n) + + assert Quaternion(22, 23, 55, 8).scalar_part() == 22 + assert Quaternion(w, x, y, z).scalar_part() == w + + assert Quaternion(22, 23, 55, 8).vector_part() == Quaternion(0, 23, 55, 8) + assert Quaternion(w, x, y, z).vector_part() == Quaternion(0, x, y, z) + + assert q1.axis() == Quaternion(0, 2*sqrt(29)/29, 3*sqrt(29)/29, 4*sqrt(29)/29) + assert q1.axis().pow(2) == Quaternion(-1, 0, 0, 0) + assert q0.axis().scalar_part() == 0 + assert (q.axis() == Quaternion(0, + x/sqrt(x**2 + y**2 + z**2), + y/sqrt(x**2 + y**2 + z**2), + z/sqrt(x**2 + y**2 + z**2))) + + assert q0.is_pure() is True + assert q1.is_pure() is False + assert Quaternion(0, 0, 0, 3).is_pure() is True + assert Quaternion(0, 2, 10, 3).is_pure() is True + assert Quaternion(w, 2, 10, 3).is_pure() is None + + assert q1.angle() == 2*atan(sqrt(29)) + assert q.angle() == 2*atan2(sqrt(x**2 + y**2 + z**2), w) + + assert Quaternion.arc_coplanar(q1, Quaternion(2, 4, 6, 8)) is True + assert Quaternion.arc_coplanar(q1, Quaternion(1, -2, -3, -4)) is True + assert Quaternion.arc_coplanar(q1, Quaternion(1, 8, 12, 16)) is True + assert Quaternion.arc_coplanar(q1, Quaternion(1, 2, 3, 4)) is True + assert Quaternion.arc_coplanar(q1, Quaternion(w, 4, 6, 8)) is True + assert Quaternion.arc_coplanar(q1, Quaternion(2, 7, 4, 1)) is False + assert Quaternion.arc_coplanar(q1, Quaternion(w, x, y, z)) is None + raises(ValueError, lambda: Quaternion.arc_coplanar(q1, q0)) + + assert Quaternion.vector_coplanar( + Quaternion(0, 8, 12, 16), + Quaternion(0, 4, 6, 8), + Quaternion(0, 2, 3, 4)) is True + assert Quaternion.vector_coplanar( + Quaternion(0, 0, 0, 0), Quaternion(0, 4, 6, 8), Quaternion(0, 2, 3, 4)) is True + assert Quaternion.vector_coplanar( + Quaternion(0, 8, 2, 6), Quaternion(0, 1, 6, 6), Quaternion(0, 0, 3, 4)) is False + assert Quaternion.vector_coplanar( + Quaternion(0, 1, 3, 4), + Quaternion(0, 4, w, 6), + Quaternion(0, 6, 8, 1)) is None + raises(ValueError, lambda: + Quaternion.vector_coplanar(q0, Quaternion(0, 4, 6, 8), q1)) + + assert Quaternion(0, 1, 2, 3).parallel(Quaternion(0, 2, 4, 6)) is True + assert Quaternion(0, 1, 2, 3).parallel(Quaternion(0, 2, 2, 6)) is False + assert Quaternion(0, 1, 2, 3).parallel(Quaternion(w, x, y, 6)) is None + raises(ValueError, lambda: q0.parallel(q1)) + + assert Quaternion(0, 1, 2, 3).orthogonal(Quaternion(0, -2, 1, 0)) is True + assert Quaternion(0, 2, 4, 7).orthogonal(Quaternion(0, 2, 2, 6)) is False + assert Quaternion(0, 2, 4, 7).orthogonal(Quaternion(w, x, y, 6)) is None + raises(ValueError, lambda: q0.orthogonal(q1)) + + assert q1.index_vector() == Quaternion( + 0, 2*sqrt(870)/29, + 3*sqrt(870)/29, + 4*sqrt(870)/29) + assert Quaternion(0, 3, 9, 4).index_vector() == Quaternion(0, 3, 9, 4) + + assert Quaternion(4, 3, 9, 4).mensor() == log(sqrt(122)) + assert Quaternion(3, 3, 0, 2).mensor() == log(sqrt(22)) + + assert q0.is_zero_quaternion() is True + assert q1.is_zero_quaternion() is False + assert Quaternion(w, 0, 0, 0).is_zero_quaternion() is None + +def test_quaternion_conversions(): + q1 = Quaternion(1, 2, 3, 4) + + assert q1.to_axis_angle() == ((2 * sqrt(29)/29, + 3 * sqrt(29)/29, + 4 * sqrt(29)/29), + 2 * acos(sqrt(30)/30)) + + assert (q1.to_rotation_matrix() == + Matrix([[Rational(-2, 3), Rational(2, 15), Rational(11, 15)], + [Rational(2, 3), Rational(-1, 3), Rational(2, 3)], + [Rational(1, 3), Rational(14, 15), Rational(2, 15)]])) + + assert (q1.to_rotation_matrix((1, 1, 1)) == + Matrix([ + [Rational(-2, 3), Rational(2, 15), Rational(11, 15), Rational(4, 5)], + [Rational(2, 3), Rational(-1, 3), Rational(2, 3), S.Zero], + [Rational(1, 3), Rational(14, 15), Rational(2, 15), Rational(-2, 5)], + [S.Zero, S.Zero, S.Zero, S.One]])) + + theta = symbols("theta", real=True) + q2 = Quaternion(cos(theta/2), 0, 0, sin(theta/2)) + + assert trigsimp(q2.to_rotation_matrix()) == Matrix([ + [cos(theta), -sin(theta), 0], + [sin(theta), cos(theta), 0], + [0, 0, 1]]) + + assert q2.to_axis_angle() == ((0, 0, sin(theta/2)/Abs(sin(theta/2))), + 2*acos(cos(theta/2))) + + assert trigsimp(q2.to_rotation_matrix((1, 1, 1))) == Matrix([ + [cos(theta), -sin(theta), 0, sin(theta) - cos(theta) + 1], + [sin(theta), cos(theta), 0, -sin(theta) - cos(theta) + 1], + [0, 0, 1, 0], + [0, 0, 0, 1]]) + + +def test_rotation_matrix_homogeneous(): + q = Quaternion(w, x, y, z) + R1 = q.to_rotation_matrix(homogeneous=True) * q.norm()**2 + R2 = simplify(q.to_rotation_matrix(homogeneous=False) * q.norm()**2) + assert R1 == R2 + + +def test_quaternion_rotation_iss1593(): + """ + There was a sign mistake in the definition, + of the rotation matrix. This tests that particular sign mistake. + See issue 1593 for reference. + See wikipedia + https://en.wikipedia.org/wiki/Quaternions_and_spatial_rotation#Quaternion-derived_rotation_matrix + for the correct definition + """ + q = Quaternion(cos(phi/2), sin(phi/2), 0, 0) + assert(trigsimp(q.to_rotation_matrix()) == Matrix([ + [1, 0, 0], + [0, cos(phi), -sin(phi)], + [0, sin(phi), cos(phi)]])) + + +def test_quaternion_multiplication(): + q1 = Quaternion(3 + 4*I, 2 + 5*I, 0, 7 + 8*I, real_field = False) + q2 = Quaternion(1, 2, 3, 5) + q3 = Quaternion(1, 1, 1, y) + + assert Quaternion._generic_mul(S(4), S.One) == 4 + assert (Quaternion._generic_mul(S(4), q1) == + Quaternion(12 + 16*I, 8 + 20*I, 0, 28 + 32*I)) + assert q2.mul(2) == Quaternion(2, 4, 6, 10) + assert q2.mul(q3) == Quaternion(-5*y - 4, 3*y - 2, 9 - 2*y, y + 4) + assert q2.mul(q3) == q2*q3 + + z = symbols('z', complex=True) + z_quat = Quaternion(re(z), im(z), 0, 0) + q = Quaternion(*symbols('q:4', real=True)) + + assert z * q == z_quat * q + assert q * z == q * z_quat + + +def test_issue_16318(): + #for rtruediv + q0 = Quaternion(0, 0, 0, 0) + raises(ValueError, lambda: 1/q0) + #for rotate_point + q = Quaternion(1, 2, 3, 4) + (axis, angle) = q.to_axis_angle() + assert Quaternion.rotate_point((1, 1, 1), (axis, angle)) == (S.One / 5, 1, S(7) / 5) + #test for to_axis_angle + q = Quaternion(-1, 1, 1, 1) + axis = (-sqrt(3)/3, -sqrt(3)/3, -sqrt(3)/3) + angle = 2*pi/3 + assert (axis, angle) == q.to_axis_angle() + + +@slow +def test_to_euler(): + q = Quaternion(w, x, y, z) + q_normalized = q.normalize() + + seqs = ['zxy', 'zyx', 'zyz', 'zxz'] + seqs += [seq.upper() for seq in seqs] + + for seq in seqs: + euler_from_q = q.to_euler(seq) + q_back = simplify(Quaternion.from_euler(euler_from_q, seq)) + assert q_back == q_normalized + + +def test_to_euler_iss24504(): + """ + There was a mistake in the degenerate case testing + See issue 24504 for reference. + """ + q = Quaternion.from_euler((phi, 0, 0), 'zyz') + assert trigsimp(q.to_euler('zyz'), inverse=True) == (phi, 0, 0) + + +def test_to_euler_numerical_singilarities(): + + def test_one_case(angles, seq): + q = Quaternion.from_euler(angles, seq) + assert q.to_euler(seq) == angles + + # symmetric + test_one_case((pi/2, 0, 0), 'zyz') + test_one_case((pi/2, 0, 0), 'ZYZ') + test_one_case((pi/2, pi, 0), 'zyz') + test_one_case((pi/2, pi, 0), 'ZYZ') + + # asymmetric + test_one_case((pi/2, pi/2, 0), 'zyx') + test_one_case((pi/2, -pi/2, 0), 'zyx') + test_one_case((pi/2, pi/2, 0), 'ZYX') + test_one_case((pi/2, -pi/2, 0), 'ZYX') + + +@slow +def test_to_euler_options(): + def test_one_case(q): + angles1 = Matrix(q.to_euler(seq, True, True)) + angles2 = Matrix(q.to_euler(seq, False, False)) + angle_errors = simplify(angles1-angles2).evalf() + for angle_error in angle_errors: + # forcing angles to set {-pi, pi} + angle_error = (angle_error + pi) % (2 * pi) - pi + assert angle_error < 10e-7 + + for xyz in ('xyz', 'XYZ'): + for seq_tuple in permutations(xyz): + for symmetric in (True, False): + if symmetric: + seq = ''.join([seq_tuple[0], seq_tuple[1], seq_tuple[0]]) + else: + seq = ''.join(seq_tuple) + + for elements in product([-1, 0, 1], repeat=4): + q = Quaternion(*elements) + if not q.is_zero_quaternion(): + test_one_case(q) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..af862653f3ce0eeb67f7764e16c32f3466e87024 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__init__.py @@ -0,0 +1,18 @@ +""" +A module to implement logical predicates and assumption system. +""" + +from .assume import ( + AppliedPredicate, Predicate, AssumptionsContext, assuming, + global_assumptions +) +from .ask import Q, ask, register_handler, remove_handler +from .refine import refine +from .relation import BinaryRelation, AppliedBinaryRelation + +__all__ = [ + 'AppliedPredicate', 'Predicate', 'AssumptionsContext', 'assuming', + 'global_assumptions', 'Q', 'ask', 'register_handler', 'remove_handler', + 'refine', + 'BinaryRelation', 'AppliedBinaryRelation' +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..36145b9ffb2b28d022d2e2d5c425a89cd3101d53 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/ask.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/ask.cpython-310.pyc new file mode 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0000000000000000000000000000000000000000..a2b8b35223d799d7f8500b7e35163772de39cbc0 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/__pycache__/refine.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask.py new file mode 100644 index 0000000000000000000000000000000000000000..ec81ec8ecce245c2a798cf9e71af1e9373292bc1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask.py @@ -0,0 +1,651 @@ +"""Module for querying SymPy objects about assumptions.""" + +from sympy.assumptions.assume import (global_assumptions, Predicate, + AppliedPredicate) +from sympy.assumptions.cnf import CNF, EncodedCNF, Literal +from sympy.core import sympify +from sympy.core.kind import BooleanKind +from sympy.core.relational import Eq, Ne, Gt, Lt, Ge, Le +from sympy.logic.inference import satisfiable +from sympy.utilities.decorator import memoize_property +from sympy.utilities.exceptions import (sympy_deprecation_warning, + SymPyDeprecationWarning, + ignore_warnings) + + +# Memoization is necessary for the properties of AssumptionKeys to +# ensure that only one object of Predicate objects are created. +# This is because assumption handlers are registered on those objects. + + +class AssumptionKeys: + """ + This class contains all the supported keys by ``ask``. + It should be accessed via the instance ``sympy.Q``. + + """ + + # DO NOT add methods or properties other than predicate keys. + # SAT solver checks the properties of Q and use them to compute the + # fact system. Non-predicate attributes will break this. + + @memoize_property + def hermitian(self): + from .handlers.sets import HermitianPredicate + return HermitianPredicate() + + @memoize_property + def antihermitian(self): + from .handlers.sets import AntihermitianPredicate + return AntihermitianPredicate() + + @memoize_property + def real(self): + from .handlers.sets import RealPredicate + return RealPredicate() + + @memoize_property + def extended_real(self): + from .handlers.sets import ExtendedRealPredicate + return ExtendedRealPredicate() + + @memoize_property + def imaginary(self): + from .handlers.sets import ImaginaryPredicate + return ImaginaryPredicate() + + @memoize_property + def complex(self): + from .handlers.sets import ComplexPredicate + return ComplexPredicate() + + @memoize_property + def algebraic(self): + from .handlers.sets import AlgebraicPredicate + return AlgebraicPredicate() + + @memoize_property + def transcendental(self): + from .predicates.sets import TranscendentalPredicate + return TranscendentalPredicate() + + @memoize_property + def integer(self): + from .handlers.sets import IntegerPredicate + return IntegerPredicate() + + @memoize_property + def noninteger(self): + from .predicates.sets import NonIntegerPredicate + return NonIntegerPredicate() + + @memoize_property + def rational(self): + from .handlers.sets import RationalPredicate + return RationalPredicate() + + @memoize_property + def irrational(self): + from .handlers.sets import IrrationalPredicate + return IrrationalPredicate() + + @memoize_property + def finite(self): + from .handlers.calculus import FinitePredicate + return FinitePredicate() + + @memoize_property + def infinite(self): + from .handlers.calculus import InfinitePredicate + return InfinitePredicate() + + @memoize_property + def positive_infinite(self): + from .handlers.calculus import PositiveInfinitePredicate + return PositiveInfinitePredicate() + + @memoize_property + def negative_infinite(self): + from .handlers.calculus import NegativeInfinitePredicate + return NegativeInfinitePredicate() + + @memoize_property + def positive(self): + from .handlers.order import PositivePredicate + return PositivePredicate() + + @memoize_property + def negative(self): + from .handlers.order import NegativePredicate + return NegativePredicate() + + @memoize_property + def zero(self): + from .handlers.order import ZeroPredicate + return ZeroPredicate() + + @memoize_property + def extended_positive(self): + from .handlers.order import ExtendedPositivePredicate + return ExtendedPositivePredicate() + + @memoize_property + def extended_negative(self): + from .handlers.order import ExtendedNegativePredicate + return ExtendedNegativePredicate() + + @memoize_property + def nonzero(self): + from .handlers.order import NonZeroPredicate + return NonZeroPredicate() + + @memoize_property + def nonpositive(self): + from .handlers.order import NonPositivePredicate + return NonPositivePredicate() + + @memoize_property + def nonnegative(self): + from .handlers.order import NonNegativePredicate + return NonNegativePredicate() + + @memoize_property + def extended_nonzero(self): + from .handlers.order import ExtendedNonZeroPredicate + return ExtendedNonZeroPredicate() + + @memoize_property + def extended_nonpositive(self): + from .handlers.order import ExtendedNonPositivePredicate + return ExtendedNonPositivePredicate() + + @memoize_property + def extended_nonnegative(self): + from .handlers.order import ExtendedNonNegativePredicate + return ExtendedNonNegativePredicate() + + @memoize_property + def even(self): + from .handlers.ntheory import EvenPredicate + return EvenPredicate() + + @memoize_property + def odd(self): + from .handlers.ntheory import OddPredicate + return OddPredicate() + + @memoize_property + def prime(self): + from .handlers.ntheory import PrimePredicate + return PrimePredicate() + + @memoize_property + def composite(self): + from .handlers.ntheory import CompositePredicate + return CompositePredicate() + + @memoize_property + def commutative(self): + from .handlers.common import CommutativePredicate + return CommutativePredicate() + + @memoize_property + def is_true(self): + from .handlers.common import IsTruePredicate + return IsTruePredicate() + + @memoize_property + def symmetric(self): + from .handlers.matrices import SymmetricPredicate + return SymmetricPredicate() + + @memoize_property + def invertible(self): + from .handlers.matrices import InvertiblePredicate + return InvertiblePredicate() + + @memoize_property + def orthogonal(self): + from .handlers.matrices import OrthogonalPredicate + return OrthogonalPredicate() + + @memoize_property + def unitary(self): + from .handlers.matrices import UnitaryPredicate + return UnitaryPredicate() + + @memoize_property + def positive_definite(self): + from .handlers.matrices import PositiveDefinitePredicate + return PositiveDefinitePredicate() + + @memoize_property + def upper_triangular(self): + from .handlers.matrices import UpperTriangularPredicate + return UpperTriangularPredicate() + + @memoize_property + def lower_triangular(self): + from .handlers.matrices import LowerTriangularPredicate + return LowerTriangularPredicate() + + @memoize_property + def diagonal(self): + from .handlers.matrices import DiagonalPredicate + return DiagonalPredicate() + + @memoize_property + def fullrank(self): + from .handlers.matrices import FullRankPredicate + return FullRankPredicate() + + @memoize_property + def square(self): + from .handlers.matrices import SquarePredicate + return SquarePredicate() + + @memoize_property + def integer_elements(self): + from .handlers.matrices import IntegerElementsPredicate + return IntegerElementsPredicate() + + @memoize_property + def real_elements(self): + from .handlers.matrices import RealElementsPredicate + return RealElementsPredicate() + + @memoize_property + def complex_elements(self): + from .handlers.matrices import ComplexElementsPredicate + return ComplexElementsPredicate() + + @memoize_property + def singular(self): + from .predicates.matrices import SingularPredicate + return SingularPredicate() + + @memoize_property + def normal(self): + from .predicates.matrices import NormalPredicate + return NormalPredicate() + + @memoize_property + def triangular(self): + from .predicates.matrices import TriangularPredicate + return TriangularPredicate() + + @memoize_property + def unit_triangular(self): + from .predicates.matrices import UnitTriangularPredicate + return UnitTriangularPredicate() + + @memoize_property + def eq(self): + from .relation.equality import EqualityPredicate + return EqualityPredicate() + + @memoize_property + def ne(self): + from .relation.equality import UnequalityPredicate + return UnequalityPredicate() + + @memoize_property + def gt(self): + from .relation.equality import StrictGreaterThanPredicate + return StrictGreaterThanPredicate() + + @memoize_property + def ge(self): + from .relation.equality import GreaterThanPredicate + return GreaterThanPredicate() + + @memoize_property + def lt(self): + from .relation.equality import StrictLessThanPredicate + return StrictLessThanPredicate() + + @memoize_property + def le(self): + from .relation.equality import LessThanPredicate + return LessThanPredicate() + + +Q = AssumptionKeys() + +def _extract_all_facts(assump, exprs): + """ + Extract all relevant assumptions from *assump* with respect to given *exprs*. + + Parameters + ========== + + assump : sympy.assumptions.cnf.CNF + + exprs : tuple of expressions + + Returns + ======= + + sympy.assumptions.cnf.CNF + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.cnf import CNF + >>> from sympy.assumptions.ask import _extract_all_facts + >>> from sympy.abc import x, y + >>> assump = CNF.from_prop(Q.positive(x) & Q.integer(y)) + >>> exprs = (x,) + >>> cnf = _extract_all_facts(assump, exprs) + >>> cnf.clauses + {frozenset({Literal(Q.positive, False)})} + + """ + facts = set() + + for clause in assump.clauses: + args = [] + for literal in clause: + if isinstance(literal.lit, AppliedPredicate) and len(literal.lit.arguments) == 1: + if literal.lit.arg in exprs: + # Add literal if it has matching in it + args.append(Literal(literal.lit.function, literal.is_Not)) + else: + # If any of the literals doesn't have matching expr don't add the whole clause. + break + else: + # If any of the literals aren't unary predicate don't add the whole clause. + break + + else: + if args: + facts.add(frozenset(args)) + return CNF(facts) + + +def ask(proposition, assumptions=True, context=global_assumptions): + """ + Function to evaluate the proposition with assumptions. + + Explanation + =========== + + This function evaluates the proposition to ``True`` or ``False`` if + the truth value can be determined. If not, it returns ``None``. + + It should be discerned from :func:`~.refine` which, when applied to a + proposition, simplifies the argument to symbolic ``Boolean`` instead of + Python built-in ``True``, ``False`` or ``None``. + + **Syntax** + + * ask(proposition) + Evaluate the *proposition* in global assumption context. + + * ask(proposition, assumptions) + Evaluate the *proposition* with respect to *assumptions* in + global assumption context. + + Parameters + ========== + + proposition : Boolean + Proposition which will be evaluated to boolean value. If this is + not ``AppliedPredicate``, it will be wrapped by ``Q.is_true``. + + assumptions : Boolean, optional + Local assumptions to evaluate the *proposition*. + + context : AssumptionsContext, optional + Default assumptions to evaluate the *proposition*. By default, + this is ``sympy.assumptions.global_assumptions`` variable. + + Returns + ======= + + ``True``, ``False``, or ``None`` + + Raises + ====== + + TypeError : *proposition* or *assumptions* is not valid logical expression. + + ValueError : assumptions are inconsistent. + + Examples + ======== + + >>> from sympy import ask, Q, pi + >>> from sympy.abc import x, y + >>> ask(Q.rational(pi)) + False + >>> ask(Q.even(x*y), Q.even(x) & Q.integer(y)) + True + >>> ask(Q.prime(4*x), Q.integer(x)) + False + + If the truth value cannot be determined, ``None`` will be returned. + + >>> print(ask(Q.odd(3*x))) # cannot determine unless we know x + None + + ``ValueError`` is raised if assumptions are inconsistent. + + >>> ask(Q.integer(x), Q.even(x) & Q.odd(x)) + Traceback (most recent call last): + ... + ValueError: inconsistent assumptions Q.even(x) & Q.odd(x) + + Notes + ===== + + Relations in assumptions are not implemented (yet), so the following + will not give a meaningful result. + + >>> ask(Q.positive(x), x > 0) + + It is however a work in progress. + + See Also + ======== + + sympy.assumptions.refine.refine : Simplification using assumptions. + Proposition is not reduced to ``None`` if the truth value cannot + be determined. + """ + from sympy.assumptions.satask import satask + from sympy.assumptions.lra_satask import lra_satask + from sympy.logic.algorithms.lra_theory import UnhandledInput + + proposition = sympify(proposition) + assumptions = sympify(assumptions) + + if isinstance(proposition, Predicate) or proposition.kind is not BooleanKind: + raise TypeError("proposition must be a valid logical expression") + + if isinstance(assumptions, Predicate) or assumptions.kind is not BooleanKind: + raise TypeError("assumptions must be a valid logical expression") + + binrelpreds = {Eq: Q.eq, Ne: Q.ne, Gt: Q.gt, Lt: Q.lt, Ge: Q.ge, Le: Q.le} + if isinstance(proposition, AppliedPredicate): + key, args = proposition.function, proposition.arguments + elif proposition.func in binrelpreds: + key, args = binrelpreds[type(proposition)], proposition.args + else: + key, args = Q.is_true, (proposition,) + + # convert local and global assumptions to CNF + assump_cnf = CNF.from_prop(assumptions) + assump_cnf.extend(context) + + # extract the relevant facts from assumptions with respect to args + local_facts = _extract_all_facts(assump_cnf, args) + + # convert default facts and assumed facts to encoded CNF + known_facts_cnf = get_all_known_facts() + enc_cnf = EncodedCNF() + enc_cnf.from_cnf(CNF(known_facts_cnf)) + enc_cnf.add_from_cnf(local_facts) + + # check the satisfiability of given assumptions + if local_facts.clauses and satisfiable(enc_cnf) is False: + raise ValueError("inconsistent assumptions %s" % assumptions) + + # quick computation for single fact + res = _ask_single_fact(key, local_facts) + if res is not None: + return res + + # direct resolution method, no logic + res = key(*args)._eval_ask(assumptions) + if res is not None: + return bool(res) + + # using satask (still costly) + res = satask(proposition, assumptions=assumptions, context=context) + if res is not None: + return res + + try: + res = lra_satask(proposition, assumptions=assumptions, context=context) + except UnhandledInput: + return None + + return res + + +def _ask_single_fact(key, local_facts): + """ + Compute the truth value of single predicate using assumptions. + + Parameters + ========== + + key : sympy.assumptions.assume.Predicate + Proposition predicate. + + local_facts : sympy.assumptions.cnf.CNF + Local assumption in CNF form. + + Returns + ======= + + ``True``, ``False`` or ``None`` + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.cnf import CNF + >>> from sympy.assumptions.ask import _ask_single_fact + + If prerequisite of proposition is rejected by the assumption, + return ``False``. + + >>> key, assump = Q.zero, ~Q.zero + >>> local_facts = CNF.from_prop(assump) + >>> _ask_single_fact(key, local_facts) + False + >>> key, assump = Q.zero, ~Q.even + >>> local_facts = CNF.from_prop(assump) + >>> _ask_single_fact(key, local_facts) + False + + If assumption implies the proposition, return ``True``. + + >>> key, assump = Q.even, Q.zero + >>> local_facts = CNF.from_prop(assump) + >>> _ask_single_fact(key, local_facts) + True + + If proposition rejects the assumption, return ``False``. + + >>> key, assump = Q.even, Q.odd + >>> local_facts = CNF.from_prop(assump) + >>> _ask_single_fact(key, local_facts) + False + """ + if local_facts.clauses: + + known_facts_dict = get_known_facts_dict() + + if len(local_facts.clauses) == 1: + cl, = local_facts.clauses + if len(cl) == 1: + f, = cl + prop_facts = known_facts_dict.get(key, None) + prop_req = prop_facts[0] if prop_facts is not None else set() + if f.is_Not and f.arg in prop_req: + # the prerequisite of proposition is rejected + return False + + for clause in local_facts.clauses: + if len(clause) == 1: + f, = clause + prop_facts = known_facts_dict.get(f.arg, None) if not f.is_Not else None + if prop_facts is None: + continue + + prop_req, prop_rej = prop_facts + if key in prop_req: + # assumption implies the proposition + return True + elif key in prop_rej: + # proposition rejects the assumption + return False + + return None + + +def register_handler(key, handler): + """ + Register a handler in the ask system. key must be a string and handler a + class inheriting from AskHandler. + + .. deprecated:: 1.8. + Use multipledispatch handler instead. See :obj:`~.Predicate`. + + """ + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. The register_handler() function + should be replaced with the multipledispatch handler of Predicate. + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + ) + if isinstance(key, Predicate): + key = key.name.name + Qkey = getattr(Q, key, None) + if Qkey is not None: + Qkey.add_handler(handler) + else: + setattr(Q, key, Predicate(key, handlers=[handler])) + + +def remove_handler(key, handler): + """ + Removes a handler from the ask system. + + .. deprecated:: 1.8. + Use multipledispatch handler instead. See :obj:`~.Predicate`. + + """ + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. The remove_handler() function + should be replaced with the multipledispatch handler of Predicate. + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + ) + if isinstance(key, Predicate): + key = key.name.name + # Don't show the same warning again recursively + with ignore_warnings(SymPyDeprecationWarning): + getattr(Q, key).remove_handler(handler) + + +from sympy.assumptions.ask_generated import (get_all_known_facts, + get_known_facts_dict) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask_generated.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask_generated.py new file mode 100644 index 0000000000000000000000000000000000000000..d90cdffc1e127d78e18f70cda13d8d5e0530d41b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/ask_generated.py @@ -0,0 +1,352 @@ +""" +Do NOT manually edit this file. +Instead, run ./bin/ask_update.py. +""" + +from sympy.assumptions.ask import Q +from sympy.assumptions.cnf import Literal +from sympy.core.cache import cacheit + +@cacheit +def get_all_known_facts(): + """ + Known facts between unary predicates as CNF clauses. + """ + return { + frozenset((Literal(Q.algebraic, False), Literal(Q.imaginary, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.negative, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.positive, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.rational, True))), + frozenset((Literal(Q.algebraic, False), Literal(Q.transcendental, False), Literal(Q.zero, True))), + frozenset((Literal(Q.algebraic, True), Literal(Q.finite, False))), + frozenset((Literal(Q.algebraic, True), Literal(Q.transcendental, True))), + frozenset((Literal(Q.antihermitian, False), Literal(Q.hermitian, False), Literal(Q.zero, True))), + frozenset((Literal(Q.antihermitian, False), Literal(Q.imaginary, True))), + frozenset((Literal(Q.commutative, False), Literal(Q.finite, True))), + frozenset((Literal(Q.commutative, False), Literal(Q.infinite, True))), + frozenset((Literal(Q.complex_elements, False), Literal(Q.real_elements, True))), + frozenset((Literal(Q.composite, False), Literal(Q.even, True), Literal(Q.positive, True), Literal(Q.prime, False))), + frozenset((Literal(Q.composite, True), Literal(Q.even, False), Literal(Q.odd, False))), + frozenset((Literal(Q.composite, True), Literal(Q.positive, False))), + frozenset((Literal(Q.composite, True), Literal(Q.prime, True))), + frozenset((Literal(Q.diagonal, False), Literal(Q.lower_triangular, True), Literal(Q.upper_triangular, True))), + frozenset((Literal(Q.diagonal, True), Literal(Q.lower_triangular, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.normal, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.symmetric, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.upper_triangular, False))), + frozenset((Literal(Q.even, False), Literal(Q.odd, False), Literal(Q.prime, True))), + frozenset((Literal(Q.even, False), Literal(Q.zero, True))), + frozenset((Literal(Q.even, True), Literal(Q.odd, True))), + frozenset((Literal(Q.even, True), Literal(Q.rational, False))), + frozenset((Literal(Q.finite, False), Literal(Q.transcendental, True))), + frozenset((Literal(Q.finite, True), Literal(Q.infinite, True))), + frozenset((Literal(Q.fullrank, False), Literal(Q.invertible, True))), + frozenset((Literal(Q.fullrank, True), Literal(Q.invertible, False), Literal(Q.square, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.negative, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.positive, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.zero, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.negative, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.positive, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.zero, True))), + frozenset((Literal(Q.infinite, False), Literal(Q.negative_infinite, True))), + frozenset((Literal(Q.infinite, False), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.integer_elements, True), Literal(Q.real_elements, False))), + frozenset((Literal(Q.invertible, False), Literal(Q.positive_definite, True))), + frozenset((Literal(Q.invertible, False), Literal(Q.singular, False))), + frozenset((Literal(Q.invertible, False), Literal(Q.unitary, True))), + frozenset((Literal(Q.invertible, True), Literal(Q.singular, True))), + frozenset((Literal(Q.invertible, True), Literal(Q.square, False))), + frozenset((Literal(Q.irrational, False), Literal(Q.negative, True), Literal(Q.rational, False))), + frozenset((Literal(Q.irrational, False), Literal(Q.positive, True), Literal(Q.rational, False))), + frozenset((Literal(Q.irrational, False), Literal(Q.rational, False), Literal(Q.zero, True))), + frozenset((Literal(Q.irrational, True), Literal(Q.negative, False), Literal(Q.positive, False), Literal(Q.zero, False))), + frozenset((Literal(Q.irrational, True), Literal(Q.rational, True))), + frozenset((Literal(Q.lower_triangular, False), Literal(Q.triangular, True), Literal(Q.upper_triangular, False))), + frozenset((Literal(Q.lower_triangular, True), Literal(Q.triangular, False))), + frozenset((Literal(Q.negative, False), Literal(Q.positive, False), Literal(Q.rational, True), Literal(Q.zero, False))), + frozenset((Literal(Q.negative, True), Literal(Q.negative_infinite, True))), + frozenset((Literal(Q.negative, True), Literal(Q.positive, True))), + frozenset((Literal(Q.negative, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.negative, True), Literal(Q.zero, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.positive, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.zero, True))), + frozenset((Literal(Q.normal, False), Literal(Q.unitary, True))), + frozenset((Literal(Q.normal, True), Literal(Q.square, False))), + frozenset((Literal(Q.odd, True), Literal(Q.rational, False))), + frozenset((Literal(Q.orthogonal, False), Literal(Q.real_elements, True), Literal(Q.unitary, True))), + frozenset((Literal(Q.orthogonal, True), Literal(Q.positive_definite, False))), + frozenset((Literal(Q.orthogonal, True), Literal(Q.unitary, False))), + frozenset((Literal(Q.positive, False), Literal(Q.prime, True))), + frozenset((Literal(Q.positive, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.positive, True), Literal(Q.zero, True))), + frozenset((Literal(Q.positive_infinite, True), Literal(Q.zero, True))), + frozenset((Literal(Q.square, False), Literal(Q.symmetric, True))), + frozenset((Literal(Q.triangular, False), Literal(Q.unit_triangular, True))), + frozenset((Literal(Q.triangular, False), Literal(Q.upper_triangular, True))) + } + +@cacheit +def get_all_known_matrix_facts(): + """ + Known facts between unary predicates for matrices as CNF clauses. + """ + return { + frozenset((Literal(Q.complex_elements, False), Literal(Q.real_elements, True))), + frozenset((Literal(Q.diagonal, False), Literal(Q.lower_triangular, True), Literal(Q.upper_triangular, True))), + frozenset((Literal(Q.diagonal, True), Literal(Q.lower_triangular, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.normal, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.symmetric, False))), + frozenset((Literal(Q.diagonal, True), Literal(Q.upper_triangular, False))), + frozenset((Literal(Q.fullrank, False), Literal(Q.invertible, True))), + frozenset((Literal(Q.fullrank, True), Literal(Q.invertible, False), Literal(Q.square, True))), + frozenset((Literal(Q.integer_elements, True), Literal(Q.real_elements, False))), + frozenset((Literal(Q.invertible, False), Literal(Q.positive_definite, True))), + frozenset((Literal(Q.invertible, False), Literal(Q.singular, False))), + frozenset((Literal(Q.invertible, False), Literal(Q.unitary, True))), + frozenset((Literal(Q.invertible, True), Literal(Q.singular, True))), + frozenset((Literal(Q.invertible, True), Literal(Q.square, False))), + frozenset((Literal(Q.lower_triangular, False), Literal(Q.triangular, True), Literal(Q.upper_triangular, False))), + frozenset((Literal(Q.lower_triangular, True), Literal(Q.triangular, False))), + frozenset((Literal(Q.normal, False), Literal(Q.unitary, True))), + frozenset((Literal(Q.normal, True), Literal(Q.square, False))), + frozenset((Literal(Q.orthogonal, False), Literal(Q.real_elements, True), Literal(Q.unitary, True))), + frozenset((Literal(Q.orthogonal, True), Literal(Q.positive_definite, False))), + frozenset((Literal(Q.orthogonal, True), Literal(Q.unitary, False))), + frozenset((Literal(Q.square, False), Literal(Q.symmetric, True))), + frozenset((Literal(Q.triangular, False), Literal(Q.unit_triangular, True))), + frozenset((Literal(Q.triangular, False), Literal(Q.upper_triangular, True))) + } + +@cacheit +def get_all_known_number_facts(): + """ + Known facts between unary predicates for numbers as CNF clauses. + """ + return { + frozenset((Literal(Q.algebraic, False), Literal(Q.imaginary, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.negative, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.positive, True), Literal(Q.transcendental, False))), + frozenset((Literal(Q.algebraic, False), Literal(Q.rational, True))), + frozenset((Literal(Q.algebraic, False), Literal(Q.transcendental, False), Literal(Q.zero, True))), + frozenset((Literal(Q.algebraic, True), Literal(Q.finite, False))), + frozenset((Literal(Q.algebraic, True), Literal(Q.transcendental, True))), + frozenset((Literal(Q.antihermitian, False), Literal(Q.hermitian, False), Literal(Q.zero, True))), + frozenset((Literal(Q.antihermitian, False), Literal(Q.imaginary, True))), + frozenset((Literal(Q.commutative, False), Literal(Q.finite, True))), + frozenset((Literal(Q.commutative, False), Literal(Q.infinite, True))), + frozenset((Literal(Q.composite, False), Literal(Q.even, True), Literal(Q.positive, True), Literal(Q.prime, False))), + frozenset((Literal(Q.composite, True), Literal(Q.even, False), Literal(Q.odd, False))), + frozenset((Literal(Q.composite, True), Literal(Q.positive, False))), + frozenset((Literal(Q.composite, True), Literal(Q.prime, True))), + frozenset((Literal(Q.even, False), Literal(Q.odd, False), Literal(Q.prime, True))), + frozenset((Literal(Q.even, False), Literal(Q.zero, True))), + frozenset((Literal(Q.even, True), Literal(Q.odd, True))), + frozenset((Literal(Q.even, True), Literal(Q.rational, False))), + frozenset((Literal(Q.finite, False), Literal(Q.transcendental, True))), + frozenset((Literal(Q.finite, True), Literal(Q.infinite, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.negative, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.positive, True))), + frozenset((Literal(Q.hermitian, False), Literal(Q.zero, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.negative, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.positive, True))), + frozenset((Literal(Q.imaginary, True), Literal(Q.zero, True))), + frozenset((Literal(Q.infinite, False), Literal(Q.negative_infinite, True))), + frozenset((Literal(Q.infinite, False), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.irrational, False), Literal(Q.negative, True), Literal(Q.rational, False))), + frozenset((Literal(Q.irrational, False), Literal(Q.positive, True), Literal(Q.rational, False))), + frozenset((Literal(Q.irrational, False), Literal(Q.rational, False), Literal(Q.zero, True))), + frozenset((Literal(Q.irrational, True), Literal(Q.negative, False), Literal(Q.positive, False), Literal(Q.zero, False))), + frozenset((Literal(Q.irrational, True), Literal(Q.rational, True))), + frozenset((Literal(Q.negative, False), Literal(Q.positive, False), Literal(Q.rational, True), Literal(Q.zero, False))), + frozenset((Literal(Q.negative, True), Literal(Q.negative_infinite, True))), + frozenset((Literal(Q.negative, True), Literal(Q.positive, True))), + frozenset((Literal(Q.negative, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.negative, True), Literal(Q.zero, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.positive, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.negative_infinite, True), Literal(Q.zero, True))), + frozenset((Literal(Q.odd, True), Literal(Q.rational, False))), + frozenset((Literal(Q.positive, False), Literal(Q.prime, True))), + frozenset((Literal(Q.positive, True), Literal(Q.positive_infinite, True))), + frozenset((Literal(Q.positive, True), Literal(Q.zero, True))), + frozenset((Literal(Q.positive_infinite, True), Literal(Q.zero, True))) + } + +@cacheit +def get_known_facts_dict(): + """ + Logical relations between unary predicates as dictionary. + + Each key is a predicate, and item is two groups of predicates. + First group contains the predicates which are implied by the key, and + second group contains the predicates which are rejected by the key. + + """ + return { + Q.algebraic: (set([Q.algebraic, Q.commutative, Q.complex, Q.finite]), + set([Q.infinite, Q.negative_infinite, Q.positive_infinite, + Q.transcendental])), + Q.antihermitian: (set([Q.antihermitian]), set([])), + Q.commutative: (set([Q.commutative]), set([])), + Q.complex: (set([Q.commutative, Q.complex, Q.finite]), + set([Q.infinite, Q.negative_infinite, Q.positive_infinite])), + Q.complex_elements: (set([Q.complex_elements]), set([])), + Q.composite: (set([Q.algebraic, Q.commutative, Q.complex, Q.composite, + Q.extended_nonnegative, Q.extended_nonzero, + Q.extended_positive, Q.extended_real, Q.finite, Q.hermitian, + Q.integer, Q.nonnegative, Q.nonzero, Q.positive, Q.rational, + Q.real]), set([Q.extended_negative, Q.extended_nonpositive, + Q.imaginary, Q.infinite, Q.irrational, Q.negative, + Q.negative_infinite, Q.nonpositive, Q.positive_infinite, + Q.prime, Q.transcendental, Q.zero])), + Q.diagonal: (set([Q.diagonal, Q.lower_triangular, Q.normal, Q.square, + Q.symmetric, Q.triangular, Q.upper_triangular]), set([])), + Q.even: (set([Q.algebraic, Q.commutative, Q.complex, Q.even, + Q.extended_real, Q.finite, Q.hermitian, Q.integer, Q.rational, + Q.real]), set([Q.imaginary, Q.infinite, Q.irrational, + Q.negative_infinite, Q.odd, Q.positive_infinite, + Q.transcendental])), + Q.extended_negative: (set([Q.commutative, Q.extended_negative, + Q.extended_nonpositive, Q.extended_nonzero, Q.extended_real]), + set([Q.composite, Q.extended_nonnegative, Q.extended_positive, + Q.imaginary, Q.nonnegative, Q.positive, Q.positive_infinite, + Q.prime, Q.zero])), + Q.extended_nonnegative: (set([Q.commutative, Q.extended_nonnegative, + Q.extended_real]), set([Q.extended_negative, Q.imaginary, + Q.negative, Q.negative_infinite])), + Q.extended_nonpositive: (set([Q.commutative, Q.extended_nonpositive, + Q.extended_real]), set([Q.composite, Q.extended_positive, + Q.imaginary, Q.positive, Q.positive_infinite, Q.prime])), + Q.extended_nonzero: (set([Q.commutative, Q.extended_nonzero, + Q.extended_real]), set([Q.imaginary, Q.zero])), + Q.extended_positive: (set([Q.commutative, Q.extended_nonnegative, + Q.extended_nonzero, Q.extended_positive, Q.extended_real]), + set([Q.extended_negative, Q.extended_nonpositive, Q.imaginary, + Q.negative, Q.negative_infinite, Q.nonpositive, Q.zero])), + Q.extended_real: (set([Q.commutative, Q.extended_real]), + set([Q.imaginary])), + Q.finite: (set([Q.commutative, Q.finite]), set([Q.infinite, + Q.negative_infinite, Q.positive_infinite])), + Q.fullrank: (set([Q.fullrank]), set([])), + Q.hermitian: (set([Q.hermitian]), set([])), + Q.imaginary: (set([Q.antihermitian, Q.commutative, Q.complex, + Q.finite, Q.imaginary]), set([Q.composite, Q.even, + Q.extended_negative, Q.extended_nonnegative, + Q.extended_nonpositive, Q.extended_nonzero, + Q.extended_positive, Q.extended_real, Q.infinite, Q.integer, + Q.irrational, Q.negative, Q.negative_infinite, Q.nonnegative, + Q.nonpositive, Q.nonzero, Q.odd, Q.positive, + Q.positive_infinite, Q.prime, Q.rational, Q.real, Q.zero])), + Q.infinite: (set([Q.commutative, Q.infinite]), set([Q.algebraic, + Q.complex, Q.composite, Q.even, Q.finite, Q.imaginary, + Q.integer, Q.irrational, Q.negative, Q.nonnegative, + Q.nonpositive, Q.nonzero, Q.odd, Q.positive, Q.prime, + Q.rational, Q.real, Q.transcendental, Q.zero])), + Q.integer: (set([Q.algebraic, Q.commutative, Q.complex, + Q.extended_real, Q.finite, Q.hermitian, Q.integer, Q.rational, + Q.real]), set([Q.imaginary, Q.infinite, Q.irrational, + Q.negative_infinite, Q.positive_infinite, Q.transcendental])), + Q.integer_elements: (set([Q.complex_elements, Q.integer_elements, + Q.real_elements]), set([])), + Q.invertible: (set([Q.fullrank, Q.invertible, Q.square]), + set([Q.singular])), + Q.irrational: (set([Q.commutative, Q.complex, Q.extended_nonzero, + Q.extended_real, Q.finite, Q.hermitian, Q.irrational, + Q.nonzero, Q.real]), set([Q.composite, Q.even, Q.imaginary, + Q.infinite, Q.integer, Q.negative_infinite, Q.odd, + Q.positive_infinite, Q.prime, Q.rational, Q.zero])), + Q.is_true: (set([Q.is_true]), set([])), + Q.lower_triangular: (set([Q.lower_triangular, Q.triangular]), set([])), + Q.negative: (set([Q.commutative, Q.complex, Q.extended_negative, + Q.extended_nonpositive, Q.extended_nonzero, Q.extended_real, + Q.finite, Q.hermitian, Q.negative, Q.nonpositive, Q.nonzero, + Q.real]), set([Q.composite, Q.extended_nonnegative, + Q.extended_positive, Q.imaginary, Q.infinite, + Q.negative_infinite, Q.nonnegative, Q.positive, + Q.positive_infinite, Q.prime, Q.zero])), + Q.negative_infinite: (set([Q.commutative, Q.extended_negative, + Q.extended_nonpositive, Q.extended_nonzero, Q.extended_real, + Q.infinite, Q.negative_infinite]), set([Q.algebraic, + Q.complex, Q.composite, Q.even, Q.extended_nonnegative, + Q.extended_positive, Q.finite, Q.imaginary, Q.integer, + Q.irrational, Q.negative, Q.nonnegative, Q.nonpositive, + Q.nonzero, Q.odd, Q.positive, Q.positive_infinite, Q.prime, + Q.rational, Q.real, Q.transcendental, Q.zero])), + Q.noninteger: (set([Q.noninteger]), set([])), + Q.nonnegative: (set([Q.commutative, Q.complex, Q.extended_nonnegative, + Q.extended_real, Q.finite, Q.hermitian, Q.nonnegative, + Q.real]), set([Q.extended_negative, Q.imaginary, Q.infinite, + Q.negative, Q.negative_infinite, Q.positive_infinite])), + Q.nonpositive: (set([Q.commutative, Q.complex, Q.extended_nonpositive, + Q.extended_real, Q.finite, Q.hermitian, Q.nonpositive, + Q.real]), set([Q.composite, Q.extended_positive, Q.imaginary, + Q.infinite, Q.negative_infinite, Q.positive, + Q.positive_infinite, Q.prime])), + Q.nonzero: (set([Q.commutative, Q.complex, Q.extended_nonzero, + Q.extended_real, Q.finite, Q.hermitian, Q.nonzero, Q.real]), + set([Q.imaginary, Q.infinite, Q.negative_infinite, + Q.positive_infinite, Q.zero])), + Q.normal: (set([Q.normal, Q.square]), set([])), + Q.odd: (set([Q.algebraic, Q.commutative, Q.complex, + Q.extended_nonzero, Q.extended_real, Q.finite, Q.hermitian, + Q.integer, Q.nonzero, Q.odd, Q.rational, Q.real]), + set([Q.even, Q.imaginary, Q.infinite, Q.irrational, + Q.negative_infinite, Q.positive_infinite, Q.transcendental, + Q.zero])), + Q.orthogonal: (set([Q.fullrank, Q.invertible, Q.normal, Q.orthogonal, + Q.positive_definite, Q.square, Q.unitary]), set([Q.singular])), + Q.positive: (set([Q.commutative, Q.complex, Q.extended_nonnegative, + Q.extended_nonzero, Q.extended_positive, Q.extended_real, + Q.finite, Q.hermitian, Q.nonnegative, Q.nonzero, Q.positive, + Q.real]), set([Q.extended_negative, Q.extended_nonpositive, + Q.imaginary, Q.infinite, Q.negative, Q.negative_infinite, + Q.nonpositive, Q.positive_infinite, Q.zero])), + Q.positive_definite: (set([Q.fullrank, Q.invertible, + Q.positive_definite, Q.square]), set([Q.singular])), + Q.positive_infinite: (set([Q.commutative, Q.extended_nonnegative, + Q.extended_nonzero, Q.extended_positive, Q.extended_real, + Q.infinite, Q.positive_infinite]), set([Q.algebraic, + Q.complex, Q.composite, Q.even, Q.extended_negative, + Q.extended_nonpositive, Q.finite, Q.imaginary, Q.integer, + Q.irrational, Q.negative, Q.negative_infinite, Q.nonnegative, + Q.nonpositive, Q.nonzero, Q.odd, Q.positive, Q.prime, + Q.rational, Q.real, Q.transcendental, Q.zero])), + Q.prime: (set([Q.algebraic, Q.commutative, Q.complex, + Q.extended_nonnegative, Q.extended_nonzero, + Q.extended_positive, Q.extended_real, Q.finite, Q.hermitian, + Q.integer, Q.nonnegative, Q.nonzero, Q.positive, Q.prime, + Q.rational, Q.real]), set([Q.composite, Q.extended_negative, + Q.extended_nonpositive, Q.imaginary, Q.infinite, Q.irrational, + Q.negative, Q.negative_infinite, Q.nonpositive, + Q.positive_infinite, Q.transcendental, Q.zero])), + Q.rational: (set([Q.algebraic, Q.commutative, Q.complex, + Q.extended_real, Q.finite, Q.hermitian, Q.rational, Q.real]), + set([Q.imaginary, Q.infinite, Q.irrational, + Q.negative_infinite, Q.positive_infinite, Q.transcendental])), + Q.real: (set([Q.commutative, Q.complex, Q.extended_real, Q.finite, + Q.hermitian, Q.real]), set([Q.imaginary, Q.infinite, + Q.negative_infinite, Q.positive_infinite])), + Q.real_elements: (set([Q.complex_elements, Q.real_elements]), set([])), + Q.singular: (set([Q.singular]), set([Q.invertible, Q.orthogonal, + Q.positive_definite, Q.unitary])), + Q.square: (set([Q.square]), set([])), + Q.symmetric: (set([Q.square, Q.symmetric]), set([])), + Q.transcendental: (set([Q.commutative, Q.complex, Q.finite, + Q.transcendental]), set([Q.algebraic, Q.composite, Q.even, + Q.infinite, Q.integer, Q.negative_infinite, Q.odd, + Q.positive_infinite, Q.prime, Q.rational, Q.zero])), + Q.triangular: (set([Q.triangular]), set([])), + Q.unit_triangular: (set([Q.triangular, Q.unit_triangular]), set([])), + Q.unitary: (set([Q.fullrank, Q.invertible, Q.normal, Q.square, + Q.unitary]), set([Q.singular])), + Q.upper_triangular: (set([Q.triangular, Q.upper_triangular]), set([])), + Q.zero: (set([Q.algebraic, Q.commutative, Q.complex, Q.even, + Q.extended_nonnegative, Q.extended_nonpositive, + Q.extended_real, Q.finite, Q.hermitian, Q.integer, + Q.nonnegative, Q.nonpositive, Q.rational, Q.real, Q.zero]), + set([Q.composite, Q.extended_negative, Q.extended_nonzero, + Q.extended_positive, Q.imaginary, Q.infinite, Q.irrational, + Q.negative, Q.negative_infinite, Q.nonzero, Q.odd, Q.positive, + Q.positive_infinite, Q.prime, Q.transcendental])), + } diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/assume.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/assume.py new file mode 100644 index 0000000000000000000000000000000000000000..743195a865a1d39389d471b95728ca79834ed019 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/assume.py @@ -0,0 +1,485 @@ +"""A module which implements predicates and assumption context.""" + +from contextlib import contextmanager +import inspect +from sympy.core.symbol import Str +from sympy.core.sympify import _sympify +from sympy.logic.boolalg import Boolean, false, true +from sympy.multipledispatch.dispatcher import Dispatcher, str_signature +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import is_sequence +from sympy.utilities.source import get_class + + +class AssumptionsContext(set): + """ + Set containing default assumptions which are applied to the ``ask()`` + function. + + Explanation + =========== + + This is used to represent global assumptions, but you can also use this + class to create your own local assumptions contexts. It is basically a thin + wrapper to Python's set, so see its documentation for advanced usage. + + Examples + ======== + + The default assumption context is ``global_assumptions``, which is initially empty: + + >>> from sympy import ask, Q + >>> from sympy.assumptions import global_assumptions + >>> global_assumptions + AssumptionsContext() + + You can add default assumptions: + + >>> from sympy.abc import x + >>> global_assumptions.add(Q.real(x)) + >>> global_assumptions + AssumptionsContext({Q.real(x)}) + >>> ask(Q.real(x)) + True + + And remove them: + + >>> global_assumptions.remove(Q.real(x)) + >>> print(ask(Q.real(x))) + None + + The ``clear()`` method removes every assumption: + + >>> global_assumptions.add(Q.positive(x)) + >>> global_assumptions + AssumptionsContext({Q.positive(x)}) + >>> global_assumptions.clear() + >>> global_assumptions + AssumptionsContext() + + See Also + ======== + + assuming + + """ + + def add(self, *assumptions): + """Add assumptions.""" + for a in assumptions: + super().add(a) + + def _sympystr(self, printer): + if not self: + return "%s()" % self.__class__.__name__ + return "{}({})".format(self.__class__.__name__, printer._print_set(self)) + +global_assumptions = AssumptionsContext() + + +class AppliedPredicate(Boolean): + """ + The class of expressions resulting from applying ``Predicate`` to + the arguments. ``AppliedPredicate`` merely wraps its argument and + remain unevaluated. To evaluate it, use the ``ask()`` function. + + Examples + ======== + + >>> from sympy import Q, ask + >>> Q.integer(1) + Q.integer(1) + + The ``function`` attribute returns the predicate, and the ``arguments`` + attribute returns the tuple of arguments. + + >>> type(Q.integer(1)) + + >>> Q.integer(1).function + Q.integer + >>> Q.integer(1).arguments + (1,) + + Applied predicates can be evaluated to a boolean value with ``ask``: + + >>> ask(Q.integer(1)) + True + + """ + __slots__ = () + + def __new__(cls, predicate, *args): + if not isinstance(predicate, Predicate): + raise TypeError("%s is not a Predicate." % predicate) + args = map(_sympify, args) + return super().__new__(cls, predicate, *args) + + @property + def arg(self): + """ + Return the expression used by this assumption. + + Examples + ======== + + >>> from sympy import Q, Symbol + >>> x = Symbol('x') + >>> a = Q.integer(x + 1) + >>> a.arg + x + 1 + + """ + # Will be deprecated + args = self._args + if len(args) == 2: + # backwards compatibility + return args[1] + raise TypeError("'arg' property is allowed only for unary predicates.") + + @property + def function(self): + """ + Return the predicate. + """ + # Will be changed to self.args[0] after args overriding is removed + return self._args[0] + + @property + def arguments(self): + """ + Return the arguments which are applied to the predicate. + """ + # Will be changed to self.args[1:] after args overriding is removed + return self._args[1:] + + def _eval_ask(self, assumptions): + return self.function.eval(self.arguments, assumptions) + + @property + def binary_symbols(self): + from .ask import Q + if self.function == Q.is_true: + i = self.arguments[0] + if i.is_Boolean or i.is_Symbol: + return i.binary_symbols + if self.function in (Q.eq, Q.ne): + if true in self.arguments or false in self.arguments: + if self.arguments[0].is_Symbol: + return {self.arguments[0]} + elif self.arguments[1].is_Symbol: + return {self.arguments[1]} + return set() + + +class PredicateMeta(type): + def __new__(cls, clsname, bases, dct): + # If handler is not defined, assign empty dispatcher. + if "handler" not in dct: + name = f"Ask{clsname.capitalize()}Handler" + handler = Dispatcher(name, doc="Handler for key %s" % name) + dct["handler"] = handler + + dct["_orig_doc"] = dct.get("__doc__", "") + + return super().__new__(cls, clsname, bases, dct) + + @property + def __doc__(cls): + handler = cls.handler + doc = cls._orig_doc + if cls is not Predicate and handler is not None: + doc += "Handler\n" + doc += " =======\n\n" + + # Append the handler's doc without breaking sphinx documentation. + docs = [" Multiply dispatched method: %s" % handler.name] + if handler.doc: + for line in handler.doc.splitlines(): + if not line: + continue + docs.append(" %s" % line) + other = [] + for sig in handler.ordering[::-1]: + func = handler.funcs[sig] + if func.__doc__: + s = ' Inputs: <%s>' % str_signature(sig) + lines = [] + for line in func.__doc__.splitlines(): + lines.append(" %s" % line) + s += "\n".join(lines) + docs.append(s) + else: + other.append(str_signature(sig)) + if other: + othersig = " Other signatures:" + for line in other: + othersig += "\n * %s" % line + docs.append(othersig) + + doc += '\n\n'.join(docs) + + return doc + + +class Predicate(Boolean, metaclass=PredicateMeta): + """ + Base class for mathematical predicates. It also serves as a + constructor for undefined predicate objects. + + Explanation + =========== + + Predicate is a function that returns a boolean value [1]. + + Predicate function is object, and it is instance of predicate class. + When a predicate is applied to arguments, ``AppliedPredicate`` + instance is returned. This merely wraps the argument and remain + unevaluated. To obtain the truth value of applied predicate, use the + function ``ask``. + + Evaluation of predicate is done by multiple dispatching. You can + register new handler to the predicate to support new types. + + Every predicate in SymPy can be accessed via the property of ``Q``. + For example, ``Q.even`` returns the predicate which checks if the + argument is even number. + + To define a predicate which can be evaluated, you must subclass this + class, make an instance of it, and register it to ``Q``. After then, + dispatch the handler by argument types. + + If you directly construct predicate using this class, you will get + ``UndefinedPredicate`` which cannot be dispatched. This is useful + when you are building boolean expressions which do not need to be + evaluated. + + Examples + ======== + + Applying and evaluating to boolean value: + + >>> from sympy import Q, ask + >>> ask(Q.prime(7)) + True + + You can define a new predicate by subclassing and dispatching. Here, + we define a predicate for sexy primes [2] as an example. + + >>> from sympy import Predicate, Integer + >>> class SexyPrimePredicate(Predicate): + ... name = "sexyprime" + >>> Q.sexyprime = SexyPrimePredicate() + >>> @Q.sexyprime.register(Integer, Integer) + ... def _(int1, int2, assumptions): + ... args = sorted([int1, int2]) + ... if not all(ask(Q.prime(a), assumptions) for a in args): + ... return False + ... return args[1] - args[0] == 6 + >>> ask(Q.sexyprime(5, 11)) + True + + Direct constructing returns ``UndefinedPredicate``, which can be + applied but cannot be dispatched. + + >>> from sympy import Predicate, Integer + >>> Q.P = Predicate("P") + >>> type(Q.P) + + >>> Q.P(1) + Q.P(1) + >>> Q.P.register(Integer)(lambda expr, assump: True) + Traceback (most recent call last): + ... + TypeError: cannot be dispatched. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Predicate_%28mathematical_logic%29 + .. [2] https://en.wikipedia.org/wiki/Sexy_prime + + """ + + is_Atom = True + + def __new__(cls, *args, **kwargs): + if cls is Predicate: + return UndefinedPredicate(*args, **kwargs) + obj = super().__new__(cls, *args) + return obj + + @property + def name(self): + # May be overridden + return type(self).__name__ + + @classmethod + def register(cls, *types, **kwargs): + """ + Register the signature to the handler. + """ + if cls.handler is None: + raise TypeError("%s cannot be dispatched." % type(cls)) + return cls.handler.register(*types, **kwargs) + + @classmethod + def register_many(cls, *types, **kwargs): + """ + Register multiple signatures to same handler. + """ + def _(func): + for t in types: + if not is_sequence(t): + t = (t,) # for convenience, allow passing `type` to mean `(type,)` + cls.register(*t, **kwargs)(func) + return _ + + def __call__(self, *args): + return AppliedPredicate(self, *args) + + def eval(self, args, assumptions=True): + """ + Evaluate ``self(*args)`` under the given assumptions. + + This uses only direct resolution methods, not logical inference. + """ + result = None + try: + result = self.handler(*args, assumptions=assumptions) + except NotImplementedError: + pass + return result + + def _eval_refine(self, assumptions): + # When Predicate is no longer Boolean, delete this method + return self + + +class UndefinedPredicate(Predicate): + """ + Predicate without handler. + + Explanation + =========== + + This predicate is generated by using ``Predicate`` directly for + construction. It does not have a handler, and evaluating this with + arguments is done by SAT solver. + + Examples + ======== + + >>> from sympy import Predicate, Q + >>> Q.P = Predicate('P') + >>> Q.P.func + + >>> Q.P.name + Str('P') + + """ + + handler = None + + def __new__(cls, name, handlers=None): + # "handlers" parameter supports old design + if not isinstance(name, Str): + name = Str(name) + obj = super(Boolean, cls).__new__(cls, name) + obj.handlers = handlers or [] + return obj + + @property + def name(self): + return self.args[0] + + def _hashable_content(self): + return (self.name,) + + def __getnewargs__(self): + return (self.name,) + + def __call__(self, expr): + return AppliedPredicate(self, expr) + + def add_handler(self, handler): + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. Predicate.add_handler() + should be replaced with the multipledispatch handler of Predicate. + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + ) + self.handlers.append(handler) + + def remove_handler(self, handler): + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. Predicate.remove_handler() + should be replaced with the multipledispatch handler of Predicate. + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + ) + self.handlers.remove(handler) + + def eval(self, args, assumptions=True): + # Support for deprecated design + # When old design is removed, this will always return None + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. Evaluating UndefinedPredicate + objects should be replaced with the multipledispatch handler of + Predicate. + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + stacklevel=5, + ) + expr, = args + res, _res = None, None + mro = inspect.getmro(type(expr)) + for handler in self.handlers: + cls = get_class(handler) + for subclass in mro: + eval_ = getattr(cls, subclass.__name__, None) + if eval_ is None: + continue + res = eval_(expr, assumptions) + # Do not stop if value returned is None + # Try to check for higher classes + if res is None: + continue + if _res is None: + _res = res + else: + # only check consistency if both resolutors have concluded + if _res != res: + raise ValueError('incompatible resolutors') + break + return res + + +@contextmanager +def assuming(*assumptions): + """ + Context manager for assumptions. + + Examples + ======== + + >>> from sympy import assuming, Q, ask + >>> from sympy.abc import x, y + >>> print(ask(Q.integer(x + y))) + None + >>> with assuming(Q.integer(x), Q.integer(y)): + ... print(ask(Q.integer(x + y))) + True + """ + old_global_assumptions = global_assumptions.copy() + global_assumptions.update(assumptions) + try: + yield + finally: + global_assumptions.clear() + global_assumptions.update(old_global_assumptions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/cnf.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/cnf.py new file mode 100644 index 0000000000000000000000000000000000000000..a95d27bed6eeb64c42f4edd9d49bd8e5753069e5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/cnf.py @@ -0,0 +1,445 @@ +""" +The classes used here are for the internal use of assumptions system +only and should not be used anywhere else as these do not possess the +signatures common to SymPy objects. For general use of logic constructs +please refer to sympy.logic classes And, Or, Not, etc. +""" +from itertools import combinations, product, zip_longest +from sympy.assumptions.assume import AppliedPredicate, Predicate +from sympy.core.relational import Eq, Ne, Gt, Lt, Ge, Le +from sympy.core.singleton import S +from sympy.logic.boolalg import Or, And, Not, Xnor +from sympy.logic.boolalg import (Equivalent, ITE, Implies, Nand, Nor, Xor) + + +class Literal: + """ + The smallest element of a CNF object. + + Parameters + ========== + + lit : Boolean expression + + is_Not : bool + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.cnf import Literal + >>> from sympy.abc import x + >>> Literal(Q.even(x)) + Literal(Q.even(x), False) + >>> Literal(~Q.even(x)) + Literal(Q.even(x), True) + """ + + def __new__(cls, lit, is_Not=False): + if isinstance(lit, Not): + lit = lit.args[0] + is_Not = True + elif isinstance(lit, (AND, OR, Literal)): + return ~lit if is_Not else lit + obj = super().__new__(cls) + obj.lit = lit + obj.is_Not = is_Not + return obj + + @property + def arg(self): + return self.lit + + def rcall(self, expr): + if callable(self.lit): + lit = self.lit(expr) + else: + lit = self.lit.apply(expr) + return type(self)(lit, self.is_Not) + + def __invert__(self): + is_Not = not self.is_Not + return Literal(self.lit, is_Not) + + def __str__(self): + return '{}({}, {})'.format(type(self).__name__, self.lit, self.is_Not) + + __repr__ = __str__ + + def __eq__(self, other): + return self.arg == other.arg and self.is_Not == other.is_Not + + def __hash__(self): + h = hash((type(self).__name__, self.arg, self.is_Not)) + return h + + +class OR: + """ + A low-level implementation for Or + """ + def __init__(self, *args): + self._args = args + + @property + def args(self): + return sorted(self._args, key=str) + + def rcall(self, expr): + return type(self)(*[arg.rcall(expr) + for arg in self._args + ]) + + def __invert__(self): + return AND(*[~arg for arg in self._args]) + + def __hash__(self): + return hash((type(self).__name__,) + tuple(self.args)) + + def __eq__(self, other): + return self.args == other.args + + def __str__(self): + s = '(' + ' | '.join([str(arg) for arg in self.args]) + ')' + return s + + __repr__ = __str__ + + +class AND: + """ + A low-level implementation for And + """ + def __init__(self, *args): + self._args = args + + def __invert__(self): + return OR(*[~arg for arg in self._args]) + + @property + def args(self): + return sorted(self._args, key=str) + + def rcall(self, expr): + return type(self)(*[arg.rcall(expr) + for arg in self._args + ]) + + def __hash__(self): + return hash((type(self).__name__,) + tuple(self.args)) + + def __eq__(self, other): + return self.args == other.args + + def __str__(self): + s = '('+' & '.join([str(arg) for arg in self.args])+')' + return s + + __repr__ = __str__ + + +def to_NNF(expr, composite_map=None): + """ + Generates the Negation Normal Form of any boolean expression in terms + of AND, OR, and Literal objects. + + Examples + ======== + + >>> from sympy import Q, Eq + >>> from sympy.assumptions.cnf import to_NNF + >>> from sympy.abc import x, y + >>> expr = Q.even(x) & ~Q.positive(x) + >>> to_NNF(expr) + (Literal(Q.even(x), False) & Literal(Q.positive(x), True)) + + Supported boolean objects are converted to corresponding predicates. + + >>> to_NNF(Eq(x, y)) + Literal(Q.eq(x, y), False) + + If ``composite_map`` argument is given, ``to_NNF`` decomposes the + specified predicate into a combination of primitive predicates. + + >>> cmap = {Q.nonpositive: Q.negative | Q.zero} + >>> to_NNF(Q.nonpositive, cmap) + (Literal(Q.negative, False) | Literal(Q.zero, False)) + >>> to_NNF(Q.nonpositive(x), cmap) + (Literal(Q.negative(x), False) | Literal(Q.zero(x), False)) + """ + from sympy.assumptions.ask import Q + + if composite_map is None: + composite_map = {} + + + binrelpreds = {Eq: Q.eq, Ne: Q.ne, Gt: Q.gt, Lt: Q.lt, Ge: Q.ge, Le: Q.le} + if type(expr) in binrelpreds: + pred = binrelpreds[type(expr)] + expr = pred(*expr.args) + + if isinstance(expr, Not): + arg = expr.args[0] + tmp = to_NNF(arg, composite_map) # Strategy: negate the NNF of expr + return ~tmp + + if isinstance(expr, Or): + return OR(*[to_NNF(x, composite_map) for x in Or.make_args(expr)]) + + if isinstance(expr, And): + return AND(*[to_NNF(x, composite_map) for x in And.make_args(expr)]) + + if isinstance(expr, Nand): + tmp = AND(*[to_NNF(x, composite_map) for x in expr.args]) + return ~tmp + + if isinstance(expr, Nor): + tmp = OR(*[to_NNF(x, composite_map) for x in expr.args]) + return ~tmp + + if isinstance(expr, Xor): + cnfs = [] + for i in range(0, len(expr.args) + 1, 2): + for neg in combinations(expr.args, i): + clause = [~to_NNF(s, composite_map) if s in neg else to_NNF(s, composite_map) + for s in expr.args] + cnfs.append(OR(*clause)) + return AND(*cnfs) + + if isinstance(expr, Xnor): + cnfs = [] + for i in range(0, len(expr.args) + 1, 2): + for neg in combinations(expr.args, i): + clause = [~to_NNF(s, composite_map) if s in neg else to_NNF(s, composite_map) + for s in expr.args] + cnfs.append(OR(*clause)) + return ~AND(*cnfs) + + if isinstance(expr, Implies): + L, R = to_NNF(expr.args[0], composite_map), to_NNF(expr.args[1], composite_map) + return OR(~L, R) + + if isinstance(expr, Equivalent): + cnfs = [] + for a, b in zip_longest(expr.args, expr.args[1:], fillvalue=expr.args[0]): + a = to_NNF(a, composite_map) + b = to_NNF(b, composite_map) + cnfs.append(OR(~a, b)) + return AND(*cnfs) + + if isinstance(expr, ITE): + L = to_NNF(expr.args[0], composite_map) + M = to_NNF(expr.args[1], composite_map) + R = to_NNF(expr.args[2], composite_map) + return AND(OR(~L, M), OR(L, R)) + + if isinstance(expr, AppliedPredicate): + pred, args = expr.function, expr.arguments + newpred = composite_map.get(pred, None) + if newpred is not None: + return to_NNF(newpred.rcall(*args), composite_map) + + if isinstance(expr, Predicate): + newpred = composite_map.get(expr, None) + if newpred is not None: + return to_NNF(newpred, composite_map) + + return Literal(expr) + + +def distribute_AND_over_OR(expr): + """ + Distributes AND over OR in the NNF expression. + Returns the result( Conjunctive Normal Form of expression) + as a CNF object. + """ + if not isinstance(expr, (AND, OR)): + tmp = set() + tmp.add(frozenset((expr,))) + return CNF(tmp) + + if isinstance(expr, OR): + return CNF.all_or(*[distribute_AND_over_OR(arg) + for arg in expr._args]) + + if isinstance(expr, AND): + return CNF.all_and(*[distribute_AND_over_OR(arg) + for arg in expr._args]) + + +class CNF: + """ + Class to represent CNF of a Boolean expression. + Consists of set of clauses, which themselves are stored as + frozenset of Literal objects. + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.cnf import CNF + >>> from sympy.abc import x + >>> cnf = CNF.from_prop(Q.real(x) & ~Q.zero(x)) + >>> cnf.clauses + {frozenset({Literal(Q.zero(x), True)}), + frozenset({Literal(Q.negative(x), False), + Literal(Q.positive(x), False), Literal(Q.zero(x), False)})} + """ + def __init__(self, clauses=None): + if not clauses: + clauses = set() + self.clauses = clauses + + def add(self, prop): + clauses = CNF.to_CNF(prop).clauses + self.add_clauses(clauses) + + def __str__(self): + s = ' & '.join( + ['(' + ' | '.join([str(lit) for lit in clause]) +')' + for clause in self.clauses] + ) + return s + + def extend(self, props): + for p in props: + self.add(p) + return self + + def copy(self): + return CNF(set(self.clauses)) + + def add_clauses(self, clauses): + self.clauses |= clauses + + @classmethod + def from_prop(cls, prop): + res = cls() + res.add(prop) + return res + + def __iand__(self, other): + self.add_clauses(other.clauses) + return self + + def all_predicates(self): + predicates = set() + for c in self.clauses: + predicates |= {arg.lit for arg in c} + return predicates + + def _or(self, cnf): + clauses = set() + for a, b in product(self.clauses, cnf.clauses): + tmp = set(a) + tmp.update(b) + clauses.add(frozenset(tmp)) + return CNF(clauses) + + def _and(self, cnf): + clauses = self.clauses.union(cnf.clauses) + return CNF(clauses) + + def _not(self): + clss = list(self.clauses) + ll = {frozenset((~x,)) for x in clss[-1]} + ll = CNF(ll) + + for rest in clss[:-1]: + p = {frozenset((~x,)) for x in rest} + ll = ll._or(CNF(p)) + return ll + + def rcall(self, expr): + clause_list = [] + for clause in self.clauses: + lits = [arg.rcall(expr) for arg in clause] + clause_list.append(OR(*lits)) + expr = AND(*clause_list) + return distribute_AND_over_OR(expr) + + @classmethod + def all_or(cls, *cnfs): + b = cnfs[0].copy() + for rest in cnfs[1:]: + b = b._or(rest) + return b + + @classmethod + def all_and(cls, *cnfs): + b = cnfs[0].copy() + for rest in cnfs[1:]: + b = b._and(rest) + return b + + @classmethod + def to_CNF(cls, expr): + from sympy.assumptions.facts import get_composite_predicates + expr = to_NNF(expr, get_composite_predicates()) + expr = distribute_AND_over_OR(expr) + return expr + + @classmethod + def CNF_to_cnf(cls, cnf): + """ + Converts CNF object to SymPy's boolean expression + retaining the form of expression. + """ + def remove_literal(arg): + return Not(arg.lit) if arg.is_Not else arg.lit + + return And(*(Or(*(remove_literal(arg) for arg in clause)) for clause in cnf.clauses)) + + +class EncodedCNF: + """ + Class for encoding the CNF expression. + """ + def __init__(self, data=None, encoding=None): + if not data and not encoding: + data = [] + encoding = {} + self.data = data + self.encoding = encoding + self._symbols = list(encoding.keys()) + + def from_cnf(self, cnf): + self._symbols = list(cnf.all_predicates()) + n = len(self._symbols) + self.encoding = dict(zip(self._symbols, range(1, n + 1))) + self.data = [self.encode(clause) for clause in cnf.clauses] + + @property + def symbols(self): + return self._symbols + + @property + def variables(self): + return range(1, len(self._symbols) + 1) + + def copy(self): + new_data = [set(clause) for clause in self.data] + return EncodedCNF(new_data, dict(self.encoding)) + + def add_prop(self, prop): + cnf = CNF.from_prop(prop) + self.add_from_cnf(cnf) + + def add_from_cnf(self, cnf): + clauses = [self.encode(clause) for clause in cnf.clauses] + self.data += clauses + + def encode_arg(self, arg): + literal = arg.lit + value = self.encoding.get(literal, None) + if value is None: + n = len(self._symbols) + self._symbols.append(literal) + value = self.encoding[literal] = n + 1 + if arg.is_Not: + return -value + else: + return value + + def encode(self, clause): + return {self.encode_arg(arg) if not arg.lit == S.false else 0 for arg in clause} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/facts.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/facts.py new file mode 100644 index 0000000000000000000000000000000000000000..2ff268677cf74e252ac6c3bc3eecbea08b9414d0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/facts.py @@ -0,0 +1,270 @@ +""" +Known facts in assumptions module. + +This module defines the facts between unary predicates in ``get_known_facts()``, +and supports functions to generate the contents in +``sympy.assumptions.ask_generated`` file. +""" + +from sympy.assumptions.ask import Q +from sympy.assumptions.assume import AppliedPredicate +from sympy.core.cache import cacheit +from sympy.core.symbol import Symbol +from sympy.logic.boolalg import (to_cnf, And, Not, Implies, Equivalent, + Exclusive,) +from sympy.logic.inference import satisfiable + + +@cacheit +def get_composite_predicates(): + # To reduce the complexity of sat solver, these predicates are + # transformed into the combination of primitive predicates. + return { + Q.real : Q.negative | Q.zero | Q.positive, + Q.integer : Q.even | Q.odd, + Q.nonpositive : Q.negative | Q.zero, + Q.nonzero : Q.negative | Q.positive, + Q.nonnegative : Q.zero | Q.positive, + Q.extended_real : Q.negative_infinite | Q.negative | Q.zero | Q.positive | Q.positive_infinite, + Q.extended_positive: Q.positive | Q.positive_infinite, + Q.extended_negative: Q.negative | Q.negative_infinite, + Q.extended_nonzero: Q.negative_infinite | Q.negative | Q.positive | Q.positive_infinite, + Q.extended_nonpositive: Q.negative_infinite | Q.negative | Q.zero, + Q.extended_nonnegative: Q.zero | Q.positive | Q.positive_infinite, + Q.complex : Q.algebraic | Q.transcendental + } + + +@cacheit +def get_known_facts(x=None): + """ + Facts between unary predicates. + + Parameters + ========== + + x : Symbol, optional + Placeholder symbol for unary facts. Default is ``Symbol('x')``. + + Returns + ======= + + fact : Known facts in conjugated normal form. + + """ + if x is None: + x = Symbol('x') + + fact = And( + get_number_facts(x), + get_matrix_facts(x) + ) + return fact + + +@cacheit +def get_number_facts(x = None): + """ + Facts between unary number predicates. + + Parameters + ========== + + x : Symbol, optional + Placeholder symbol for unary facts. Default is ``Symbol('x')``. + + Returns + ======= + + fact : Known facts in conjugated normal form. + + """ + if x is None: + x = Symbol('x') + + fact = And( + # primitive predicates for extended real exclude each other. + Exclusive(Q.negative_infinite(x), Q.negative(x), Q.zero(x), + Q.positive(x), Q.positive_infinite(x)), + + # build complex plane + Exclusive(Q.real(x), Q.imaginary(x)), + Implies(Q.real(x) | Q.imaginary(x), Q.complex(x)), + + # other subsets of complex + Exclusive(Q.transcendental(x), Q.algebraic(x)), + Equivalent(Q.real(x), Q.rational(x) | Q.irrational(x)), + Exclusive(Q.irrational(x), Q.rational(x)), + Implies(Q.rational(x), Q.algebraic(x)), + + # integers + Exclusive(Q.even(x), Q.odd(x)), + Implies(Q.integer(x), Q.rational(x)), + Implies(Q.zero(x), Q.even(x)), + Exclusive(Q.composite(x), Q.prime(x)), + Implies(Q.composite(x) | Q.prime(x), Q.integer(x) & Q.positive(x)), + Implies(Q.even(x) & Q.positive(x) & ~Q.prime(x), Q.composite(x)), + + # hermitian and antihermitian + Implies(Q.real(x), Q.hermitian(x)), + Implies(Q.imaginary(x), Q.antihermitian(x)), + Implies(Q.zero(x), Q.hermitian(x) | Q.antihermitian(x)), + + # define finity and infinity, and build extended real line + Exclusive(Q.infinite(x), Q.finite(x)), + Implies(Q.complex(x), Q.finite(x)), + Implies(Q.negative_infinite(x) | Q.positive_infinite(x), Q.infinite(x)), + + # commutativity + Implies(Q.finite(x) | Q.infinite(x), Q.commutative(x)), + ) + return fact + + +@cacheit +def get_matrix_facts(x = None): + """ + Facts between unary matrix predicates. + + Parameters + ========== + + x : Symbol, optional + Placeholder symbol for unary facts. Default is ``Symbol('x')``. + + Returns + ======= + + fact : Known facts in conjugated normal form. + + """ + if x is None: + x = Symbol('x') + + fact = And( + # matrices + Implies(Q.orthogonal(x), Q.positive_definite(x)), + Implies(Q.orthogonal(x), Q.unitary(x)), + Implies(Q.unitary(x) & Q.real_elements(x), Q.orthogonal(x)), + Implies(Q.unitary(x), Q.normal(x)), + Implies(Q.unitary(x), Q.invertible(x)), + Implies(Q.normal(x), Q.square(x)), + Implies(Q.diagonal(x), Q.normal(x)), + Implies(Q.positive_definite(x), Q.invertible(x)), + Implies(Q.diagonal(x), Q.upper_triangular(x)), + Implies(Q.diagonal(x), Q.lower_triangular(x)), + Implies(Q.lower_triangular(x), Q.triangular(x)), + Implies(Q.upper_triangular(x), Q.triangular(x)), + Implies(Q.triangular(x), Q.upper_triangular(x) | Q.lower_triangular(x)), + Implies(Q.upper_triangular(x) & Q.lower_triangular(x), Q.diagonal(x)), + Implies(Q.diagonal(x), Q.symmetric(x)), + Implies(Q.unit_triangular(x), Q.triangular(x)), + Implies(Q.invertible(x), Q.fullrank(x)), + Implies(Q.invertible(x), Q.square(x)), + Implies(Q.symmetric(x), Q.square(x)), + Implies(Q.fullrank(x) & Q.square(x), Q.invertible(x)), + Equivalent(Q.invertible(x), ~Q.singular(x)), + Implies(Q.integer_elements(x), Q.real_elements(x)), + Implies(Q.real_elements(x), Q.complex_elements(x)), + ) + return fact + + + +def generate_known_facts_dict(keys, fact): + """ + Computes and returns a dictionary which contains the relations between + unary predicates. + + Each key is a predicate, and item is two groups of predicates. + First group contains the predicates which are implied by the key, and + second group contains the predicates which are rejected by the key. + + All predicates in *keys* and *fact* must be unary and have same placeholder + symbol. + + Parameters + ========== + + keys : list of AppliedPredicate instances. + + fact : Fact between predicates in conjugated normal form. + + Examples + ======== + + >>> from sympy import Q, And, Implies + >>> from sympy.assumptions.facts import generate_known_facts_dict + >>> from sympy.abc import x + >>> keys = [Q.even(x), Q.odd(x), Q.zero(x)] + >>> fact = And(Implies(Q.even(x), ~Q.odd(x)), + ... Implies(Q.zero(x), Q.even(x))) + >>> generate_known_facts_dict(keys, fact) + {Q.even: ({Q.even}, {Q.odd}), + Q.odd: ({Q.odd}, {Q.even, Q.zero}), + Q.zero: ({Q.even, Q.zero}, {Q.odd})} + """ + fact_cnf = to_cnf(fact) + mapping = single_fact_lookup(keys, fact_cnf) + + ret = {} + for key, value in mapping.items(): + implied = set() + rejected = set() + for expr in value: + if isinstance(expr, AppliedPredicate): + implied.add(expr.function) + elif isinstance(expr, Not): + pred = expr.args[0] + rejected.add(pred.function) + ret[key.function] = (implied, rejected) + return ret + + +@cacheit +def get_known_facts_keys(): + """ + Return every unary predicates registered to ``Q``. + + This function is used to generate the keys for + ``generate_known_facts_dict``. + + """ + # exclude polyadic predicates + exclude = {Q.eq, Q.ne, Q.gt, Q.lt, Q.ge, Q.le} + + result = [] + for attr in Q.__class__.__dict__: + if attr.startswith('__'): + continue + pred = getattr(Q, attr) + if pred in exclude: + continue + result.append(pred) + return result + + +def single_fact_lookup(known_facts_keys, known_facts_cnf): + # Return the dictionary for quick lookup of single fact + mapping = {} + for key in known_facts_keys: + mapping[key] = {key} + for other_key in known_facts_keys: + if other_key != key: + if ask_full_inference(other_key, key, known_facts_cnf): + mapping[key].add(other_key) + if ask_full_inference(~other_key, key, known_facts_cnf): + mapping[key].add(~other_key) + return mapping + + +def ask_full_inference(proposition, assumptions, known_facts_cnf): + """ + Method for inferring properties about objects. + + """ + if not satisfiable(And(known_facts_cnf, assumptions, proposition)): + return False + if not satisfiable(And(known_facts_cnf, assumptions, Not(proposition))): + return True + return None diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..0fbe618eb8b43e252ac8fb0baf1eeee22bf347cc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/__init__.py @@ -0,0 +1,13 @@ +""" +Multipledispatch handlers for ``Predicate`` are implemented here. +Handlers in this module are not directly imported to other modules in +order to avoid circular import problem. +""" + +from .common import (AskHandler, CommonHandler, + test_closed_group) + +__all__ = [ + 'AskHandler', 'CommonHandler', + 'test_closed_group' +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/calculus.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/calculus.py new file mode 100644 index 0000000000000000000000000000000000000000..e2b9c43ccea216988a25aa671ea23bc81d2209ff --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/calculus.py @@ -0,0 +1,273 @@ +""" +This module contains query handlers responsible for calculus queries: +infinitesimal, finite, etc. +""" + +from sympy.assumptions import Q, ask +from sympy.core import Expr, Add, Mul, Pow, Symbol +from sympy.core.numbers import (NegativeInfinity, GoldenRatio, + Infinity, Exp1, ComplexInfinity, ImaginaryUnit, NaN, Number, Pi, E, + TribonacciConstant) +from sympy.functions import cos, exp, log, sign, sin +from sympy.logic.boolalg import conjuncts + +from ..predicates.calculus import (FinitePredicate, InfinitePredicate, + PositiveInfinitePredicate, NegativeInfinitePredicate) + + +# FinitePredicate + + +@FinitePredicate.register(Symbol) +def _(expr, assumptions): + """ + Handles Symbol. + """ + if expr.is_finite is not None: + return expr.is_finite + if Q.finite(expr) in conjuncts(assumptions): + return True + return None + +@FinitePredicate.register(Add) +def _(expr, assumptions): + """ + Return True if expr is bounded, False if not and None if unknown. + + Truth Table: + + +-------+-----+-----------+-----------+ + | | | | | + | | B | U | ? | + | | | | | + +-------+-----+---+---+---+---+---+---+ + | | | | | | | | | + | | |'+'|'-'|'x'|'+'|'-'|'x'| + | | | | | | | | | + +-------+-----+---+---+---+---+---+---+ + | | | | | + | B | B | U | ? | + | | | | | + +---+---+-----+---+---+---+---+---+---+ + | | | | | | | | | | + | |'+'| | U | ? | ? | U | ? | ? | + | | | | | | | | | | + | +---+-----+---+---+---+---+---+---+ + | | | | | | | | | | + | U |'-'| | ? | U | ? | ? | U | ? | + | | | | | | | | | | + | +---+-----+---+---+---+---+---+---+ + | | | | | | + | |'x'| | ? | ? | + | | | | | | + +---+---+-----+---+---+---+---+---+---+ + | | | | | + | ? | | | ? | + | | | | | + +-------+-----+-----------+---+---+---+ + + * 'B' = Bounded + + * 'U' = Unbounded + + * '?' = unknown boundedness + + * '+' = positive sign + + * '-' = negative sign + + * 'x' = sign unknown + + * All Bounded -> True + + * 1 Unbounded and the rest Bounded -> False + + * >1 Unbounded, all with same known sign -> False + + * Any Unknown and unknown sign -> None + + * Else -> None + + When the signs are not the same you can have an undefined + result as in oo - oo, hence 'bounded' is also undefined. + """ + sign = -1 # sign of unknown or infinite + result = True + for arg in expr.args: + _bounded = ask(Q.finite(arg), assumptions) + if _bounded: + continue + s = ask(Q.extended_positive(arg), assumptions) + # if there has been more than one sign or if the sign of this arg + # is None and Bounded is None or there was already + # an unknown sign, return None + if sign != -1 and s != sign or \ + s is None and None in (_bounded, sign): + return None + else: + sign = s + # once False, do not change + if result is not False: + result = _bounded + return result + +@FinitePredicate.register(Mul) +def _(expr, assumptions): + """ + Return True if expr is bounded, False if not and None if unknown. + + Truth Table: + + +---+---+---+--------+ + | | | | | + | | B | U | ? | + | | | | | + +---+---+---+---+----+ + | | | | | | + | | | | s | /s | + | | | | | | + +---+---+---+---+----+ + | | | | | + | B | B | U | ? | + | | | | | + +---+---+---+---+----+ + | | | | | | + | U | | U | U | ? | + | | | | | | + +---+---+---+---+----+ + | | | | | + | ? | | | ? | + | | | | | + +---+---+---+---+----+ + + * B = Bounded + + * U = Unbounded + + * ? = unknown boundedness + + * s = signed (hence nonzero) + + * /s = not signed + """ + result = True + possible_zero = False + for arg in expr.args: + _bounded = ask(Q.finite(arg), assumptions) + if _bounded: + if ask(Q.zero(arg), assumptions) is not False: + if result is False: + return None + possible_zero = True + elif _bounded is None: + if result is None: + return None + if ask(Q.extended_nonzero(arg), assumptions) is None: + return None + if result is not False: + result = None + else: + if possible_zero: + return None + result = False + return result + +@FinitePredicate.register(Pow) +def _(expr, assumptions): + """ + * Unbounded ** NonZero -> Unbounded + + * Bounded ** Bounded -> Bounded + + * Abs()<=1 ** Positive -> Bounded + + * Abs()>=1 ** Negative -> Bounded + + * Otherwise unknown + """ + if expr.base == E: + return ask(Q.finite(expr.exp), assumptions) + + base_bounded = ask(Q.finite(expr.base), assumptions) + exp_bounded = ask(Q.finite(expr.exp), assumptions) + if base_bounded is None and exp_bounded is None: # Common Case + return None + if base_bounded is False and ask(Q.extended_nonzero(expr.exp), assumptions): + return False + if base_bounded and exp_bounded: + is_base_zero = ask(Q.zero(expr.base),assumptions) + is_exp_negative = ask(Q.negative(expr.exp),assumptions) + if is_base_zero is True and is_exp_negative is True: + return False + if is_base_zero is not False and is_exp_negative is not False: + return None + return True + if (abs(expr.base) <= 1) == True and ask(Q.extended_positive(expr.exp), assumptions): + return True + if (abs(expr.base) >= 1) == True and ask(Q.extended_negative(expr.exp), assumptions): + return True + if (abs(expr.base) >= 1) == True and exp_bounded is False: + return False + return None + +@FinitePredicate.register(exp) +def _(expr, assumptions): + return ask(Q.finite(expr.exp), assumptions) + +@FinitePredicate.register(log) +def _(expr, assumptions): + # After complex -> finite fact is registered to new assumption system, + # querying Q.infinite may be removed. + if ask(Q.infinite(expr.args[0]), assumptions): + return False + return ask(~Q.zero(expr.args[0]), assumptions) + +@FinitePredicate.register_many(cos, sin, Number, Pi, Exp1, GoldenRatio, + TribonacciConstant, ImaginaryUnit, sign) +def _(expr, assumptions): + return True + +@FinitePredicate.register_many(ComplexInfinity, Infinity, NegativeInfinity) +def _(expr, assumptions): + return False + +@FinitePredicate.register(NaN) +def _(expr, assumptions): + return None + + +# InfinitePredicate + + +@InfinitePredicate.register(Expr) +def _(expr, assumptions): + is_finite = Q.finite(expr)._eval_ask(assumptions) + if is_finite is None: + return None + return not is_finite + + +# PositiveInfinitePredicate + + +@PositiveInfinitePredicate.register(Infinity) +def _(expr, assumptions): + return True + + +@PositiveInfinitePredicate.register_many(NegativeInfinity, ComplexInfinity) +def _(expr, assumptions): + return False + + +# NegativeInfinitePredicate + + +@NegativeInfinitePredicate.register(NegativeInfinity) +def _(expr, assumptions): + return True + + +@NegativeInfinitePredicate.register_many(Infinity, ComplexInfinity) +def _(expr, assumptions): + return False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/common.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/common.py new file mode 100644 index 0000000000000000000000000000000000000000..f6e9f6f321be461c09b16c03b9cec5708404d21a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/common.py @@ -0,0 +1,164 @@ +""" +This module defines base class for handlers and some core handlers: +``Q.commutative`` and ``Q.is_true``. +""" + +from sympy.assumptions import Q, ask, AppliedPredicate +from sympy.core import Basic, Symbol +from sympy.core.logic import _fuzzy_group, fuzzy_and, fuzzy_or +from sympy.core.numbers import NaN, Number +from sympy.logic.boolalg import (And, BooleanTrue, BooleanFalse, conjuncts, + Equivalent, Implies, Not, Or) +from sympy.utilities.exceptions import sympy_deprecation_warning + +from ..predicates.common import CommutativePredicate, IsTruePredicate + + +class AskHandler: + """Base class that all Ask Handlers must inherit.""" + def __new__(cls, *args, **kwargs): + sympy_deprecation_warning( + """ + The AskHandler system is deprecated. The AskHandler class should + be replaced with the multipledispatch handler of Predicate + """, + deprecated_since_version="1.8", + active_deprecations_target='deprecated-askhandler', + ) + return super().__new__(cls, *args, **kwargs) + + +class CommonHandler(AskHandler): + # Deprecated + """Defines some useful methods common to most Handlers. """ + + @staticmethod + def AlwaysTrue(expr, assumptions): + return True + + @staticmethod + def AlwaysFalse(expr, assumptions): + return False + + @staticmethod + def AlwaysNone(expr, assumptions): + return None + + NaN = AlwaysFalse + + +# CommutativePredicate + +@CommutativePredicate.register(Symbol) +def _(expr, assumptions): + """Objects are expected to be commutative unless otherwise stated""" + assumps = conjuncts(assumptions) + if expr.is_commutative is not None: + return expr.is_commutative and not ~Q.commutative(expr) in assumps + if Q.commutative(expr) in assumps: + return True + elif ~Q.commutative(expr) in assumps: + return False + return True + +@CommutativePredicate.register(Basic) +def _(expr, assumptions): + for arg in expr.args: + if not ask(Q.commutative(arg), assumptions): + return False + return True + +@CommutativePredicate.register(Number) +def _(expr, assumptions): + return True + +@CommutativePredicate.register(NaN) +def _(expr, assumptions): + return True + + +# IsTruePredicate + +@IsTruePredicate.register(bool) +def _(expr, assumptions): + return expr + +@IsTruePredicate.register(BooleanTrue) +def _(expr, assumptions): + return True + +@IsTruePredicate.register(BooleanFalse) +def _(expr, assumptions): + return False + +@IsTruePredicate.register(AppliedPredicate) +def _(expr, assumptions): + return ask(expr, assumptions) + +@IsTruePredicate.register(Not) +def _(expr, assumptions): + arg = expr.args[0] + if arg.is_Symbol: + # symbol used as abstract boolean object + return None + value = ask(arg, assumptions=assumptions) + if value in (True, False): + return not value + else: + return None + +@IsTruePredicate.register(Or) +def _(expr, assumptions): + result = False + for arg in expr.args: + p = ask(arg, assumptions=assumptions) + if p is True: + return True + if p is None: + result = None + return result + +@IsTruePredicate.register(And) +def _(expr, assumptions): + result = True + for arg in expr.args: + p = ask(arg, assumptions=assumptions) + if p is False: + return False + if p is None: + result = None + return result + +@IsTruePredicate.register(Implies) +def _(expr, assumptions): + p, q = expr.args + return ask(~p | q, assumptions=assumptions) + +@IsTruePredicate.register(Equivalent) +def _(expr, assumptions): + p, q = expr.args + pt = ask(p, assumptions=assumptions) + if pt is None: + return None + qt = ask(q, assumptions=assumptions) + if qt is None: + return None + return pt == qt + + +#### Helper methods +def test_closed_group(expr, assumptions, key): + """ + Test for membership in a group with respect + to the current operation. + """ + return _fuzzy_group( + (ask(key(a), assumptions) for a in expr.args), quick_exit=True) + +def ask_all(*queries, assumptions): + return fuzzy_and( + (ask(query, assumptions) for query in queries)) + +def ask_any(*queries, assumptions): + return fuzzy_or( + (ask(query, assumptions) for query in queries)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/matrices.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..3b20385360136629ea037eb7238c45b70ba57fd2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/matrices.py @@ -0,0 +1,716 @@ +""" +This module contains query handlers responsible for Matrices queries: +Square, Symmetric, Invertible etc. +""" + +from sympy.logic.boolalg import conjuncts +from sympy.assumptions import Q, ask +from sympy.assumptions.handlers import test_closed_group +from sympy.matrices import MatrixBase +from sympy.matrices.expressions import (BlockMatrix, BlockDiagMatrix, Determinant, + DiagMatrix, DiagonalMatrix, HadamardProduct, Identity, Inverse, MatAdd, MatMul, + MatPow, MatrixExpr, MatrixSlice, MatrixSymbol, OneMatrix, Trace, Transpose, + ZeroMatrix) +from sympy.matrices.expressions.blockmatrix import reblock_2x2 +from sympy.matrices.expressions.factorizations import Factorization +from sympy.matrices.expressions.fourier import DFT +from sympy.core.logic import fuzzy_and +from sympy.utilities.iterables import sift +from sympy.core import Basic + +from ..predicates.matrices import (SquarePredicate, SymmetricPredicate, + InvertiblePredicate, OrthogonalPredicate, UnitaryPredicate, + FullRankPredicate, PositiveDefinitePredicate, UpperTriangularPredicate, + LowerTriangularPredicate, DiagonalPredicate, IntegerElementsPredicate, + RealElementsPredicate, ComplexElementsPredicate) + + +def _Factorization(predicate, expr, assumptions): + if predicate in expr.predicates: + return True + + +# SquarePredicate + +@SquarePredicate.register(MatrixExpr) +def _(expr, assumptions): + return expr.shape[0] == expr.shape[1] + + +# SymmetricPredicate + +@SymmetricPredicate.register(MatMul) +def _(expr, assumptions): + factor, mmul = expr.as_coeff_mmul() + if all(ask(Q.symmetric(arg), assumptions) for arg in mmul.args): + return True + # TODO: implement sathandlers system for the matrices. + # Now it duplicates the general fact: Implies(Q.diagonal, Q.symmetric). + if ask(Q.diagonal(expr), assumptions): + return True + if len(mmul.args) >= 2 and mmul.args[0] == mmul.args[-1].T: + if len(mmul.args) == 2: + return True + return ask(Q.symmetric(MatMul(*mmul.args[1:-1])), assumptions) + +@SymmetricPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.symmetric(base), assumptions) + return None + +@SymmetricPredicate.register(MatAdd) +def _(expr, assumptions): + return all(ask(Q.symmetric(arg), assumptions) for arg in expr.args) + +@SymmetricPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if not expr.is_square: + return False + # TODO: implement sathandlers system for the matrices. + # Now it duplicates the general fact: Implies(Q.diagonal, Q.symmetric). + if ask(Q.diagonal(expr), assumptions): + return True + if Q.symmetric(expr) in conjuncts(assumptions): + return True + +@SymmetricPredicate.register_many(OneMatrix, ZeroMatrix) +def _(expr, assumptions): + return ask(Q.square(expr), assumptions) + +@SymmetricPredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.symmetric(expr.arg), assumptions) + +@SymmetricPredicate.register(MatrixSlice) +def _(expr, assumptions): + # TODO: implement sathandlers system for the matrices. + # Now it duplicates the general fact: Implies(Q.diagonal, Q.symmetric). + if ask(Q.diagonal(expr), assumptions): + return True + if not expr.on_diag: + return None + else: + return ask(Q.symmetric(expr.parent), assumptions) + +@SymmetricPredicate.register(Identity) +def _(expr, assumptions): + return True + + +# InvertiblePredicate + +@InvertiblePredicate.register(MatMul) +def _(expr, assumptions): + factor, mmul = expr.as_coeff_mmul() + if all(ask(Q.invertible(arg), assumptions) for arg in mmul.args): + return True + if any(ask(Q.invertible(arg), assumptions) is False + for arg in mmul.args): + return False + +@InvertiblePredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + if exp.is_negative == False: + return ask(Q.invertible(base), assumptions) + return None + +@InvertiblePredicate.register(MatAdd) +def _(expr, assumptions): + return None + +@InvertiblePredicate.register(MatrixSymbol) +def _(expr, assumptions): + if not expr.is_square: + return False + if Q.invertible(expr) in conjuncts(assumptions): + return True + +@InvertiblePredicate.register_many(Identity, Inverse) +def _(expr, assumptions): + return True + +@InvertiblePredicate.register(ZeroMatrix) +def _(expr, assumptions): + return False + +@InvertiblePredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@InvertiblePredicate.register(Transpose) +def _(expr, assumptions): + return ask(Q.invertible(expr.arg), assumptions) + +@InvertiblePredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.invertible(expr.parent), assumptions) + +@InvertiblePredicate.register(MatrixBase) +def _(expr, assumptions): + if not expr.is_square: + return False + return expr.rank() == expr.rows + +@InvertiblePredicate.register(MatrixExpr) +def _(expr, assumptions): + if not expr.is_square: + return False + return None + +@InvertiblePredicate.register(BlockMatrix) +def _(expr, assumptions): + if not expr.is_square: + return False + if expr.blockshape == (1, 1): + return ask(Q.invertible(expr.blocks[0, 0]), assumptions) + expr = reblock_2x2(expr) + if expr.blockshape == (2, 2): + [[A, B], [C, D]] = expr.blocks.tolist() + if ask(Q.invertible(A), assumptions) == True: + invertible = ask(Q.invertible(D - C * A.I * B), assumptions) + if invertible is not None: + return invertible + if ask(Q.invertible(B), assumptions) == True: + invertible = ask(Q.invertible(C - D * B.I * A), assumptions) + if invertible is not None: + return invertible + if ask(Q.invertible(C), assumptions) == True: + invertible = ask(Q.invertible(B - A * C.I * D), assumptions) + if invertible is not None: + return invertible + if ask(Q.invertible(D), assumptions) == True: + invertible = ask(Q.invertible(A - B * D.I * C), assumptions) + if invertible is not None: + return invertible + return None + +@InvertiblePredicate.register(BlockDiagMatrix) +def _(expr, assumptions): + if expr.rowblocksizes != expr.colblocksizes: + return None + return fuzzy_and([ask(Q.invertible(a), assumptions) for a in expr.diag]) + + +# OrthogonalPredicate + +@OrthogonalPredicate.register(MatMul) +def _(expr, assumptions): + factor, mmul = expr.as_coeff_mmul() + if (all(ask(Q.orthogonal(arg), assumptions) for arg in mmul.args) and + factor == 1): + return True + if any(ask(Q.invertible(arg), assumptions) is False + for arg in mmul.args): + return False + +@OrthogonalPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if int_exp: + return ask(Q.orthogonal(base), assumptions) + return None + +@OrthogonalPredicate.register(MatAdd) +def _(expr, assumptions): + if (len(expr.args) == 1 and + ask(Q.orthogonal(expr.args[0]), assumptions)): + return True + +@OrthogonalPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if (not expr.is_square or + ask(Q.invertible(expr), assumptions) is False): + return False + if Q.orthogonal(expr) in conjuncts(assumptions): + return True + +@OrthogonalPredicate.register(Identity) +def _(expr, assumptions): + return True + +@OrthogonalPredicate.register(ZeroMatrix) +def _(expr, assumptions): + return False + +@OrthogonalPredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.orthogonal(expr.arg), assumptions) + +@OrthogonalPredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.orthogonal(expr.parent), assumptions) + +@OrthogonalPredicate.register(Factorization) +def _(expr, assumptions): + return _Factorization(Q.orthogonal, expr, assumptions) + + +# UnitaryPredicate + +@UnitaryPredicate.register(MatMul) +def _(expr, assumptions): + factor, mmul = expr.as_coeff_mmul() + if (all(ask(Q.unitary(arg), assumptions) for arg in mmul.args) and + abs(factor) == 1): + return True + if any(ask(Q.invertible(arg), assumptions) is False + for arg in mmul.args): + return False + +@UnitaryPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if int_exp: + return ask(Q.unitary(base), assumptions) + return None + +@UnitaryPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if (not expr.is_square or + ask(Q.invertible(expr), assumptions) is False): + return False + if Q.unitary(expr) in conjuncts(assumptions): + return True + +@UnitaryPredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.unitary(expr.arg), assumptions) + +@UnitaryPredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.unitary(expr.parent), assumptions) + +@UnitaryPredicate.register_many(DFT, Identity) +def _(expr, assumptions): + return True + +@UnitaryPredicate.register(ZeroMatrix) +def _(expr, assumptions): + return False + +@UnitaryPredicate.register(Factorization) +def _(expr, assumptions): + return _Factorization(Q.unitary, expr, assumptions) + + +# FullRankPredicate + +@FullRankPredicate.register(MatMul) +def _(expr, assumptions): + if all(ask(Q.fullrank(arg), assumptions) for arg in expr.args): + return True + +@FullRankPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if int_exp and ask(~Q.negative(exp), assumptions): + return ask(Q.fullrank(base), assumptions) + return None + +@FullRankPredicate.register(Identity) +def _(expr, assumptions): + return True + +@FullRankPredicate.register(ZeroMatrix) +def _(expr, assumptions): + return False + +@FullRankPredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@FullRankPredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.fullrank(expr.arg), assumptions) + +@FullRankPredicate.register(MatrixSlice) +def _(expr, assumptions): + if ask(Q.orthogonal(expr.parent), assumptions): + return True + + +# PositiveDefinitePredicate + +@PositiveDefinitePredicate.register(MatMul) +def _(expr, assumptions): + factor, mmul = expr.as_coeff_mmul() + if (all(ask(Q.positive_definite(arg), assumptions) + for arg in mmul.args) and factor > 0): + return True + if (len(mmul.args) >= 2 + and mmul.args[0] == mmul.args[-1].T + and ask(Q.fullrank(mmul.args[0]), assumptions)): + return ask(Q.positive_definite( + MatMul(*mmul.args[1:-1])), assumptions) + +@PositiveDefinitePredicate.register(MatPow) +def _(expr, assumptions): + # a power of a positive definite matrix is positive definite + if ask(Q.positive_definite(expr.args[0]), assumptions): + return True + +@PositiveDefinitePredicate.register(MatAdd) +def _(expr, assumptions): + if all(ask(Q.positive_definite(arg), assumptions) + for arg in expr.args): + return True + +@PositiveDefinitePredicate.register(MatrixSymbol) +def _(expr, assumptions): + if not expr.is_square: + return False + if Q.positive_definite(expr) in conjuncts(assumptions): + return True + +@PositiveDefinitePredicate.register(Identity) +def _(expr, assumptions): + return True + +@PositiveDefinitePredicate.register(ZeroMatrix) +def _(expr, assumptions): + return False + +@PositiveDefinitePredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@PositiveDefinitePredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.positive_definite(expr.arg), assumptions) + +@PositiveDefinitePredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.positive_definite(expr.parent), assumptions) + + +# UpperTriangularPredicate + +@UpperTriangularPredicate.register(MatMul) +def _(expr, assumptions): + factor, matrices = expr.as_coeff_matrices() + if all(ask(Q.upper_triangular(m), assumptions) for m in matrices): + return True + +@UpperTriangularPredicate.register(MatAdd) +def _(expr, assumptions): + if all(ask(Q.upper_triangular(arg), assumptions) for arg in expr.args): + return True + +@UpperTriangularPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.upper_triangular(base), assumptions) + return None + +@UpperTriangularPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if Q.upper_triangular(expr) in conjuncts(assumptions): + return True + +@UpperTriangularPredicate.register_many(Identity, ZeroMatrix) +def _(expr, assumptions): + return True + +@UpperTriangularPredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@UpperTriangularPredicate.register(Transpose) +def _(expr, assumptions): + return ask(Q.lower_triangular(expr.arg), assumptions) + +@UpperTriangularPredicate.register(Inverse) +def _(expr, assumptions): + return ask(Q.upper_triangular(expr.arg), assumptions) + +@UpperTriangularPredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.upper_triangular(expr.parent), assumptions) + +@UpperTriangularPredicate.register(Factorization) +def _(expr, assumptions): + return _Factorization(Q.upper_triangular, expr, assumptions) + +# LowerTriangularPredicate + +@LowerTriangularPredicate.register(MatMul) +def _(expr, assumptions): + factor, matrices = expr.as_coeff_matrices() + if all(ask(Q.lower_triangular(m), assumptions) for m in matrices): + return True + +@LowerTriangularPredicate.register(MatAdd) +def _(expr, assumptions): + if all(ask(Q.lower_triangular(arg), assumptions) for arg in expr.args): + return True + +@LowerTriangularPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.lower_triangular(base), assumptions) + return None + +@LowerTriangularPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if Q.lower_triangular(expr) in conjuncts(assumptions): + return True + +@LowerTriangularPredicate.register_many(Identity, ZeroMatrix) +def _(expr, assumptions): + return True + +@LowerTriangularPredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@LowerTriangularPredicate.register(Transpose) +def _(expr, assumptions): + return ask(Q.upper_triangular(expr.arg), assumptions) + +@LowerTriangularPredicate.register(Inverse) +def _(expr, assumptions): + return ask(Q.lower_triangular(expr.arg), assumptions) + +@LowerTriangularPredicate.register(MatrixSlice) +def _(expr, assumptions): + if not expr.on_diag: + return None + else: + return ask(Q.lower_triangular(expr.parent), assumptions) + +@LowerTriangularPredicate.register(Factorization) +def _(expr, assumptions): + return _Factorization(Q.lower_triangular, expr, assumptions) + + +# DiagonalPredicate + +def _is_empty_or_1x1(expr): + return expr.shape in ((0, 0), (1, 1)) + +@DiagonalPredicate.register(MatMul) +def _(expr, assumptions): + if _is_empty_or_1x1(expr): + return True + factor, matrices = expr.as_coeff_matrices() + if all(ask(Q.diagonal(m), assumptions) for m in matrices): + return True + +@DiagonalPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.diagonal(base), assumptions) + return None + +@DiagonalPredicate.register(MatAdd) +def _(expr, assumptions): + if all(ask(Q.diagonal(arg), assumptions) for arg in expr.args): + return True + +@DiagonalPredicate.register(MatrixSymbol) +def _(expr, assumptions): + if _is_empty_or_1x1(expr): + return True + if Q.diagonal(expr) in conjuncts(assumptions): + return True + +@DiagonalPredicate.register(OneMatrix) +def _(expr, assumptions): + return expr.shape[0] == 1 and expr.shape[1] == 1 + +@DiagonalPredicate.register_many(Inverse, Transpose) +def _(expr, assumptions): + return ask(Q.diagonal(expr.arg), assumptions) + +@DiagonalPredicate.register(MatrixSlice) +def _(expr, assumptions): + if _is_empty_or_1x1(expr): + return True + if not expr.on_diag: + return None + else: + return ask(Q.diagonal(expr.parent), assumptions) + +@DiagonalPredicate.register_many(DiagonalMatrix, DiagMatrix, Identity, ZeroMatrix) +def _(expr, assumptions): + return True + +@DiagonalPredicate.register(Factorization) +def _(expr, assumptions): + return _Factorization(Q.diagonal, expr, assumptions) + + +# IntegerElementsPredicate + +def BM_elements(predicate, expr, assumptions): + """ Block Matrix elements. """ + return all(ask(predicate(b), assumptions) for b in expr.blocks) + +def MS_elements(predicate, expr, assumptions): + """ Matrix Slice elements. """ + return ask(predicate(expr.parent), assumptions) + +def MatMul_elements(matrix_predicate, scalar_predicate, expr, assumptions): + d = sift(expr.args, lambda x: isinstance(x, MatrixExpr)) + factors, matrices = d[False], d[True] + return fuzzy_and([ + test_closed_group(Basic(*factors), assumptions, scalar_predicate), + test_closed_group(Basic(*matrices), assumptions, matrix_predicate)]) + + +@IntegerElementsPredicate.register_many(Determinant, HadamardProduct, MatAdd, + Trace, Transpose) +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.integer_elements) + +@IntegerElementsPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + if exp.is_negative == False: + return ask(Q.integer_elements(base), assumptions) + return None + +@IntegerElementsPredicate.register_many(Identity, OneMatrix, ZeroMatrix) +def _(expr, assumptions): + return True + +@IntegerElementsPredicate.register(MatMul) +def _(expr, assumptions): + return MatMul_elements(Q.integer_elements, Q.integer, expr, assumptions) + +@IntegerElementsPredicate.register(MatrixSlice) +def _(expr, assumptions): + return MS_elements(Q.integer_elements, expr, assumptions) + +@IntegerElementsPredicate.register(BlockMatrix) +def _(expr, assumptions): + return BM_elements(Q.integer_elements, expr, assumptions) + + +# RealElementsPredicate + +@RealElementsPredicate.register_many(Determinant, Factorization, HadamardProduct, + MatAdd, Trace, Transpose) +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.real_elements) + +@RealElementsPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.real_elements(base), assumptions) + return None + +@RealElementsPredicate.register(MatMul) +def _(expr, assumptions): + return MatMul_elements(Q.real_elements, Q.real, expr, assumptions) + +@RealElementsPredicate.register(MatrixSlice) +def _(expr, assumptions): + return MS_elements(Q.real_elements, expr, assumptions) + +@RealElementsPredicate.register(BlockMatrix) +def _(expr, assumptions): + return BM_elements(Q.real_elements, expr, assumptions) + + +# ComplexElementsPredicate + +@ComplexElementsPredicate.register_many(Determinant, Factorization, HadamardProduct, + Inverse, MatAdd, Trace, Transpose) +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.complex_elements) + +@ComplexElementsPredicate.register(MatPow) +def _(expr, assumptions): + # only for integer powers + base, exp = expr.args + int_exp = ask(Q.integer(exp), assumptions) + if not int_exp: + return None + non_negative = ask(~Q.negative(exp), assumptions) + if (non_negative or non_negative == False + and ask(Q.invertible(base), assumptions)): + return ask(Q.complex_elements(base), assumptions) + return None + +@ComplexElementsPredicate.register(MatMul) +def _(expr, assumptions): + return MatMul_elements(Q.complex_elements, Q.complex, expr, assumptions) + +@ComplexElementsPredicate.register(MatrixSlice) +def _(expr, assumptions): + return MS_elements(Q.complex_elements, expr, assumptions) + +@ComplexElementsPredicate.register(BlockMatrix) +def _(expr, assumptions): + return BM_elements(Q.complex_elements, expr, assumptions) + +@ComplexElementsPredicate.register(DFT) +def _(expr, assumptions): + return True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/ntheory.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/ntheory.py new file mode 100644 index 0000000000000000000000000000000000000000..cfe63ba6467ea6863c6112c5e35bb3a78191a23e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/ntheory.py @@ -0,0 +1,279 @@ +""" +Handlers for keys related to number theory: prime, even, odd, etc. +""" + +from sympy.assumptions import Q, ask +from sympy.core import Add, Basic, Expr, Float, Mul, Pow, S +from sympy.core.numbers import (ImaginaryUnit, Infinity, Integer, NaN, + NegativeInfinity, NumberSymbol, Rational, int_valued) +from sympy.functions import Abs, im, re +from sympy.ntheory import isprime + +from sympy.multipledispatch import MDNotImplementedError + +from ..predicates.ntheory import (PrimePredicate, CompositePredicate, + EvenPredicate, OddPredicate) + + +# PrimePredicate + +def _PrimePredicate_number(expr, assumptions): + # helper method + exact = not expr.atoms(Float) + try: + i = int(expr.round()) + if (expr - i).equals(0) is False: + raise TypeError + except TypeError: + return False + if exact: + return isprime(i) + # when not exact, we won't give a True or False + # since the number represents an approximate value + +@PrimePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_prime + if ret is None: + raise MDNotImplementedError + return ret + +@PrimePredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + return _PrimePredicate_number(expr, assumptions) + +@PrimePredicate.register(Mul) +def _(expr, assumptions): + if expr.is_number: + return _PrimePredicate_number(expr, assumptions) + for arg in expr.args: + if not ask(Q.integer(arg), assumptions): + return None + for arg in expr.args: + if arg.is_number and arg.is_composite: + return False + +@PrimePredicate.register(Pow) +def _(expr, assumptions): + """ + Integer**Integer -> !Prime + """ + if expr.is_number: + return _PrimePredicate_number(expr, assumptions) + if ask(Q.integer(expr.exp), assumptions) and \ + ask(Q.integer(expr.base), assumptions): + prime_base = ask(Q.prime(expr.base), assumptions) + if prime_base is False: + return False + is_exp_one = ask(Q.eq(expr.exp, 1), assumptions) + if is_exp_one is False: + return False + if prime_base is True and is_exp_one is True: + return True + +@PrimePredicate.register(Integer) +def _(expr, assumptions): + return isprime(expr) + +@PrimePredicate.register_many(Rational, Infinity, NegativeInfinity, ImaginaryUnit) +def _(expr, assumptions): + return False + +@PrimePredicate.register(Float) +def _(expr, assumptions): + return _PrimePredicate_number(expr, assumptions) + +@PrimePredicate.register(NumberSymbol) +def _(expr, assumptions): + return _PrimePredicate_number(expr, assumptions) + +@PrimePredicate.register(NaN) +def _(expr, assumptions): + return None + + +# CompositePredicate + +@CompositePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_composite + if ret is None: + raise MDNotImplementedError + return ret + +@CompositePredicate.register(Basic) +def _(expr, assumptions): + _positive = ask(Q.positive(expr), assumptions) + if _positive: + _integer = ask(Q.integer(expr), assumptions) + if _integer: + _prime = ask(Q.prime(expr), assumptions) + if _prime is None: + return + # Positive integer which is not prime is not + # necessarily composite + _is_one = ask(Q.eq(expr, 1), assumptions) + if _is_one: + return False + if _is_one is None: + return None + return not _prime + else: + return _integer + else: + return _positive + + +# EvenPredicate + +def _EvenPredicate_number(expr, assumptions): + # helper method + if isinstance(expr, (float, Float)): + if int_valued(expr): + return None + return False + try: + i = int(expr.round()) + except TypeError: + return False + if not (expr - i).equals(0): + return False + return i % 2 == 0 + +@EvenPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_even + if ret is None: + raise MDNotImplementedError + return ret + +@EvenPredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + return _EvenPredicate_number(expr, assumptions) + +@EvenPredicate.register(Mul) +def _(expr, assumptions): + """ + Even * Integer -> Even + Even * Odd -> Even + Integer * Odd -> ? + Odd * Odd -> Odd + Even * Even -> Even + Integer * Integer -> Even if Integer + Integer = Odd + otherwise -> ? + """ + if expr.is_number: + return _EvenPredicate_number(expr, assumptions) + even, odd, irrational, acc = False, 0, False, 1 + for arg in expr.args: + # check for all integers and at least one even + if ask(Q.integer(arg), assumptions): + if ask(Q.even(arg), assumptions): + even = True + elif ask(Q.odd(arg), assumptions): + odd += 1 + elif not even and acc != 1: + if ask(Q.odd(acc + arg), assumptions): + even = True + elif ask(Q.irrational(arg), assumptions): + # one irrational makes the result False + # two makes it undefined + if irrational: + break + irrational = True + else: + break + acc = arg + else: + if irrational: + return False + if even: + return True + if odd == len(expr.args): + return False + +@EvenPredicate.register(Add) +def _(expr, assumptions): + """ + Even + Odd -> Odd + Even + Even -> Even + Odd + Odd -> Even + + """ + if expr.is_number: + return _EvenPredicate_number(expr, assumptions) + _result = True + for arg in expr.args: + if ask(Q.even(arg), assumptions): + pass + elif ask(Q.odd(arg), assumptions): + _result = not _result + else: + break + else: + return _result + +@EvenPredicate.register(Pow) +def _(expr, assumptions): + if expr.is_number: + return _EvenPredicate_number(expr, assumptions) + if ask(Q.integer(expr.exp), assumptions): + if ask(Q.positive(expr.exp), assumptions): + return ask(Q.even(expr.base), assumptions) + elif ask(~Q.negative(expr.exp) & Q.odd(expr.base), assumptions): + return False + elif expr.base is S.NegativeOne: + return False + +@EvenPredicate.register(Integer) +def _(expr, assumptions): + return not bool(expr.p & 1) + +@EvenPredicate.register_many(Rational, Infinity, NegativeInfinity, ImaginaryUnit) +def _(expr, assumptions): + return False + +@EvenPredicate.register(NumberSymbol) +def _(expr, assumptions): + return _EvenPredicate_number(expr, assumptions) + +@EvenPredicate.register(Abs) +def _(expr, assumptions): + if ask(Q.real(expr.args[0]), assumptions): + return ask(Q.even(expr.args[0]), assumptions) + +@EvenPredicate.register(re) +def _(expr, assumptions): + if ask(Q.real(expr.args[0]), assumptions): + return ask(Q.even(expr.args[0]), assumptions) + +@EvenPredicate.register(im) +def _(expr, assumptions): + if ask(Q.real(expr.args[0]), assumptions): + return True + +@EvenPredicate.register(NaN) +def _(expr, assumptions): + return None + + +# OddPredicate + +@OddPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_odd + if ret is None: + raise MDNotImplementedError + return ret + +@OddPredicate.register(Basic) +def _(expr, assumptions): + _integer = ask(Q.integer(expr), assumptions) + if _integer: + _even = ask(Q.even(expr), assumptions) + if _even is None: + return None + return not _even + return _integer diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/order.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/order.py new file mode 100644 index 0000000000000000000000000000000000000000..24a8bae7f30777f62a1bec0579d58b9875143679 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/order.py @@ -0,0 +1,440 @@ +""" +Handlers related to order relations: positive, negative, etc. +""" + +from sympy.assumptions import Q, ask +from sympy.core import Add, Basic, Expr, Mul, Pow, S +from sympy.core.logic import fuzzy_not, fuzzy_and, fuzzy_or +from sympy.core.numbers import E, ImaginaryUnit, NaN, I, pi +from sympy.functions import Abs, acos, acot, asin, atan, exp, factorial, log +from sympy.matrices import Determinant, Trace +from sympy.matrices.expressions.matexpr import MatrixElement + +from sympy.multipledispatch import MDNotImplementedError + +from ..predicates.order import (NegativePredicate, NonNegativePredicate, + NonZeroPredicate, ZeroPredicate, NonPositivePredicate, PositivePredicate, + ExtendedNegativePredicate, ExtendedNonNegativePredicate, + ExtendedNonPositivePredicate, ExtendedNonZeroPredicate, + ExtendedPositivePredicate,) + + +# NegativePredicate + +def _NegativePredicate_number(expr, assumptions): + r, i = expr.as_real_imag() + + if r == S.NaN or i == S.NaN: + return None + + # If the imaginary part can symbolically be shown to be zero then + # we just evaluate the real part; otherwise we evaluate the imaginary + # part to see if it actually evaluates to zero and if it does then + # we make the comparison between the real part and zero. + if not i: + r = r.evalf(2) + if r._prec != 1: + return r < 0 + else: + i = i.evalf(2) + if i._prec != 1: + if i != 0: + return False + r = r.evalf(2) + if r._prec != 1: + return r < 0 + +@NegativePredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + return _NegativePredicate_number(expr, assumptions) + +@NegativePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_negative + if ret is None: + raise MDNotImplementedError + return ret + +@NegativePredicate.register(Add) +def _(expr, assumptions): + """ + Positive + Positive -> Positive, + Negative + Negative -> Negative + """ + if expr.is_number: + return _NegativePredicate_number(expr, assumptions) + + r = ask(Q.real(expr), assumptions) + if r is not True: + return r + + nonpos = 0 + for arg in expr.args: + if ask(Q.negative(arg), assumptions) is not True: + if ask(Q.positive(arg), assumptions) is False: + nonpos += 1 + else: + break + else: + if nonpos < len(expr.args): + return True + +@NegativePredicate.register(Mul) +def _(expr, assumptions): + if expr.is_number: + return _NegativePredicate_number(expr, assumptions) + result = None + for arg in expr.args: + if result is None: + result = False + if ask(Q.negative(arg), assumptions): + result = not result + elif ask(Q.positive(arg), assumptions): + pass + else: + return + return result + +@NegativePredicate.register(Pow) +def _(expr, assumptions): + """ + Real ** Even -> NonNegative + Real ** Odd -> same_as_base + NonNegative ** Positive -> NonNegative + """ + if expr.base == E: + # Exponential is always positive: + if ask(Q.real(expr.exp), assumptions): + return False + return + + if expr.is_number: + return _NegativePredicate_number(expr, assumptions) + if ask(Q.real(expr.base), assumptions): + if ask(Q.positive(expr.base), assumptions): + if ask(Q.real(expr.exp), assumptions): + return False + if ask(Q.even(expr.exp), assumptions): + return False + if ask(Q.odd(expr.exp), assumptions): + return ask(Q.negative(expr.base), assumptions) + +@NegativePredicate.register_many(Abs, ImaginaryUnit) +def _(expr, assumptions): + return False + +@NegativePredicate.register(exp) +def _(expr, assumptions): + if ask(Q.real(expr.exp), assumptions): + return False + raise MDNotImplementedError + + +# NonNegativePredicate + +@NonNegativePredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + notnegative = fuzzy_not(_NegativePredicate_number(expr, assumptions)) + if notnegative: + return ask(Q.real(expr), assumptions) + else: + return notnegative + +@NonNegativePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_nonnegative + if ret is None: + raise MDNotImplementedError + return ret + + +# NonZeroPredicate + +@NonZeroPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_nonzero + if ret is None: + raise MDNotImplementedError + return ret + +@NonZeroPredicate.register(Basic) +def _(expr, assumptions): + if ask(Q.real(expr)) is False: + return False + if expr.is_number: + # if there are no symbols just evalf + i = expr.evalf(2) + def nonz(i): + if i._prec != 1: + return i != 0 + return fuzzy_or(nonz(i) for i in i.as_real_imag()) + +@NonZeroPredicate.register(Add) +def _(expr, assumptions): + if all(ask(Q.positive(x), assumptions) for x in expr.args) \ + or all(ask(Q.negative(x), assumptions) for x in expr.args): + return True + +@NonZeroPredicate.register(Mul) +def _(expr, assumptions): + for arg in expr.args: + result = ask(Q.nonzero(arg), assumptions) + if result: + continue + return result + return True + +@NonZeroPredicate.register(Pow) +def _(expr, assumptions): + return ask(Q.nonzero(expr.base), assumptions) + +@NonZeroPredicate.register(Abs) +def _(expr, assumptions): + return ask(Q.nonzero(expr.args[0]), assumptions) + +@NonZeroPredicate.register(NaN) +def _(expr, assumptions): + return None + + +# ZeroPredicate + +@ZeroPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_zero + if ret is None: + raise MDNotImplementedError + return ret + +@ZeroPredicate.register(Basic) +def _(expr, assumptions): + return fuzzy_and([fuzzy_not(ask(Q.nonzero(expr), assumptions)), + ask(Q.real(expr), assumptions)]) + +@ZeroPredicate.register(Mul) +def _(expr, assumptions): + # TODO: This should be deducible from the nonzero handler + return fuzzy_or(ask(Q.zero(arg), assumptions) for arg in expr.args) + + +# NonPositivePredicate + +@NonPositivePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_nonpositive + if ret is None: + raise MDNotImplementedError + return ret + +@NonPositivePredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + notpositive = fuzzy_not(_PositivePredicate_number(expr, assumptions)) + if notpositive: + return ask(Q.real(expr), assumptions) + else: + return notpositive + + +# PositivePredicate + +def _PositivePredicate_number(expr, assumptions): + r, i = expr.as_real_imag() + # If the imaginary part can symbolically be shown to be zero then + # we just evaluate the real part; otherwise we evaluate the imaginary + # part to see if it actually evaluates to zero and if it does then + # we make the comparison between the real part and zero. + if not i: + r = r.evalf(2) + if r._prec != 1: + return r > 0 + else: + i = i.evalf(2) + if i._prec != 1: + if i != 0: + return False + r = r.evalf(2) + if r._prec != 1: + return r > 0 + +@PositivePredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_positive + if ret is None: + raise MDNotImplementedError + return ret + +@PositivePredicate.register(Basic) +def _(expr, assumptions): + if expr.is_number: + return _PositivePredicate_number(expr, assumptions) + +@PositivePredicate.register(Mul) +def _(expr, assumptions): + if expr.is_number: + return _PositivePredicate_number(expr, assumptions) + result = True + for arg in expr.args: + if ask(Q.positive(arg), assumptions): + continue + elif ask(Q.negative(arg), assumptions): + result = result ^ True + else: + return + return result + +@PositivePredicate.register(Add) +def _(expr, assumptions): + if expr.is_number: + return _PositivePredicate_number(expr, assumptions) + + r = ask(Q.real(expr), assumptions) + if r is not True: + return r + + nonneg = 0 + for arg in expr.args: + if ask(Q.positive(arg), assumptions) is not True: + if ask(Q.negative(arg), assumptions) is False: + nonneg += 1 + else: + break + else: + if nonneg < len(expr.args): + return True + +@PositivePredicate.register(Pow) +def _(expr, assumptions): + if expr.base == E: + if ask(Q.real(expr.exp), assumptions): + return True + if ask(Q.imaginary(expr.exp), assumptions): + return ask(Q.even(expr.exp/(I*pi)), assumptions) + return + + if expr.is_number: + return _PositivePredicate_number(expr, assumptions) + if ask(Q.positive(expr.base), assumptions): + if ask(Q.real(expr.exp), assumptions): + return True + if ask(Q.negative(expr.base), assumptions): + if ask(Q.even(expr.exp), assumptions): + return True + if ask(Q.odd(expr.exp), assumptions): + return False + +@PositivePredicate.register(exp) +def _(expr, assumptions): + if ask(Q.real(expr.exp), assumptions): + return True + if ask(Q.imaginary(expr.exp), assumptions): + return ask(Q.even(expr.exp/(I*pi)), assumptions) + +@PositivePredicate.register(log) +def _(expr, assumptions): + r = ask(Q.real(expr.args[0]), assumptions) + if r is not True: + return r + if ask(Q.positive(expr.args[0] - 1), assumptions): + return True + if ask(Q.negative(expr.args[0] - 1), assumptions): + return False + +@PositivePredicate.register(factorial) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.integer(x) & Q.positive(x), assumptions): + return True + +@PositivePredicate.register(ImaginaryUnit) +def _(expr, assumptions): + return False + +@PositivePredicate.register(Abs) +def _(expr, assumptions): + return ask(Q.nonzero(expr), assumptions) + +@PositivePredicate.register(Trace) +def _(expr, assumptions): + if ask(Q.positive_definite(expr.arg), assumptions): + return True + +@PositivePredicate.register(Determinant) +def _(expr, assumptions): + if ask(Q.positive_definite(expr.arg), assumptions): + return True + +@PositivePredicate.register(MatrixElement) +def _(expr, assumptions): + if (expr.i == expr.j + and ask(Q.positive_definite(expr.parent), assumptions)): + return True + +@PositivePredicate.register(atan) +def _(expr, assumptions): + return ask(Q.positive(expr.args[0]), assumptions) + +@PositivePredicate.register(asin) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.positive(x) & Q.nonpositive(x - 1), assumptions): + return True + if ask(Q.negative(x) & Q.nonnegative(x + 1), assumptions): + return False + +@PositivePredicate.register(acos) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.nonpositive(x - 1) & Q.nonnegative(x + 1), assumptions): + return True + +@PositivePredicate.register(acot) +def _(expr, assumptions): + return ask(Q.real(expr.args[0]), assumptions) + +@PositivePredicate.register(NaN) +def _(expr, assumptions): + return None + + +# ExtendedNegativePredicate + +@ExtendedNegativePredicate.register(object) +def _(expr, assumptions): + return ask(Q.negative(expr) | Q.negative_infinite(expr), assumptions) + + +# ExtendedPositivePredicate + +@ExtendedPositivePredicate.register(object) +def _(expr, assumptions): + return ask(Q.positive(expr) | Q.positive_infinite(expr), assumptions) + + +# ExtendedNonZeroPredicate + +@ExtendedNonZeroPredicate.register(object) +def _(expr, assumptions): + return ask( + Q.negative_infinite(expr) | Q.negative(expr) | Q.positive(expr) | Q.positive_infinite(expr), + assumptions) + + +# ExtendedNonPositivePredicate + +@ExtendedNonPositivePredicate.register(object) +def _(expr, assumptions): + return ask( + Q.negative_infinite(expr) | Q.negative(expr) | Q.zero(expr), + assumptions) + + +# ExtendedNonNegativePredicate + +@ExtendedNonNegativePredicate.register(object) +def _(expr, assumptions): + return ask( + Q.zero(expr) | Q.positive(expr) | Q.positive_infinite(expr), + assumptions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/sets.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/sets.py new file mode 100644 index 0000000000000000000000000000000000000000..7a13ed9bf99c5b0ffc4f32fd55cb60c2c15ab836 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/handlers/sets.py @@ -0,0 +1,816 @@ +""" +Handlers for predicates related to set membership: integer, rational, etc. +""" + +from sympy.assumptions import Q, ask +from sympy.core import Add, Basic, Expr, Mul, Pow, S +from sympy.core.numbers import (AlgebraicNumber, ComplexInfinity, Exp1, Float, + GoldenRatio, ImaginaryUnit, Infinity, Integer, NaN, NegativeInfinity, + Number, NumberSymbol, Pi, pi, Rational, TribonacciConstant, E) +from sympy.core.logic import fuzzy_bool +from sympy.functions import (Abs, acos, acot, asin, atan, cos, cot, exp, im, + log, re, sin, tan) +from sympy.core.numbers import I +from sympy.core.relational import Eq +from sympy.functions.elementary.complexes import conjugate +from sympy.matrices import Determinant, MatrixBase, Trace +from sympy.matrices.expressions.matexpr import MatrixElement + +from sympy.multipledispatch import MDNotImplementedError + +from .common import test_closed_group, ask_all, ask_any +from ..predicates.sets import (IntegerPredicate, RationalPredicate, + IrrationalPredicate, RealPredicate, ExtendedRealPredicate, + HermitianPredicate, ComplexPredicate, ImaginaryPredicate, + AntihermitianPredicate, AlgebraicPredicate) + + +# IntegerPredicate + +def _IntegerPredicate_number(expr, assumptions): + # helper function + try: + i = int(expr.round()) + if not (expr - i).equals(0): + raise TypeError + return True + except TypeError: + return False + +@IntegerPredicate.register_many(int, Integer) # type:ignore +def _(expr, assumptions): + return True + +@IntegerPredicate.register_many(Exp1, GoldenRatio, ImaginaryUnit, Infinity, + NegativeInfinity, Pi, Rational, TribonacciConstant) +def _(expr, assumptions): + return False + +@IntegerPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_integer + if ret is None: + raise MDNotImplementedError + return ret + +@IntegerPredicate.register(Add) +def _(expr, assumptions): + """ + * Integer + Integer -> Integer + * Integer + !Integer -> !Integer + * !Integer + !Integer -> ? + """ + if expr.is_number: + return _IntegerPredicate_number(expr, assumptions) + return test_closed_group(expr, assumptions, Q.integer) + +@IntegerPredicate.register(Pow) +def _(expr,assumptions): + if expr.is_number: + return _IntegerPredicate_number(expr, assumptions) + if ask_all(~Q.zero(expr.base), Q.finite(expr.base), Q.zero(expr.exp), assumptions=assumptions): + return True + if ask_all(Q.integer(expr.base), Q.integer(expr.exp), assumptions=assumptions): + if ask_any(Q.positive(expr.exp), Q.nonnegative(expr.exp) & ~Q.zero(expr.base), Q.zero(expr.base-1), Q.zero(expr.base+1), assumptions=assumptions): + return True + +@IntegerPredicate.register(Mul) +def _(expr, assumptions): + """ + * Integer*Integer -> Integer + * Integer*Irrational -> !Integer + * Odd/Even -> !Integer + * Integer*Rational -> ? + """ + if expr.is_number: + return _IntegerPredicate_number(expr, assumptions) + _output = True + for arg in expr.args: + if not ask(Q.integer(arg), assumptions): + if arg.is_Rational: + if arg.q == 2: + return ask(Q.even(2*expr), assumptions) + if ~(arg.q & 1): + return None + elif ask(Q.irrational(arg), assumptions): + if _output: + _output = False + else: + return + else: + return + + return _output + +@IntegerPredicate.register(Abs) +def _(expr, assumptions): + if ask(Q.integer(expr.args[0]), assumptions): + return True + +@IntegerPredicate.register_many(Determinant, MatrixElement, Trace) +def _(expr, assumptions): + return ask(Q.integer_elements(expr.args[0]), assumptions) + + +# RationalPredicate + +@RationalPredicate.register(Rational) +def _(expr, assumptions): + return True + +@RationalPredicate.register(Float) +def _(expr, assumptions): + return None + +@RationalPredicate.register_many(Exp1, GoldenRatio, ImaginaryUnit, Infinity, + NegativeInfinity, Pi, TribonacciConstant) +def _(expr, assumptions): + return False + +@RationalPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_rational + if ret is None: + raise MDNotImplementedError + return ret + +@RationalPredicate.register_many(Add, Mul) +def _(expr, assumptions): + """ + * Rational + Rational -> Rational + * Rational + !Rational -> !Rational + * !Rational + !Rational -> ? + """ + if expr.is_number: + if expr.as_real_imag()[1]: + return False + return test_closed_group(expr, assumptions, Q.rational) + +@RationalPredicate.register(Pow) +def _(expr, assumptions): + """ + * Rational ** Integer -> Rational + * Irrational ** Rational -> Irrational + * Rational ** Irrational -> ? + """ + if expr.base == E: + x = expr.exp + if ask(Q.rational(x), assumptions): + return ask(Q.zero(x), assumptions) + return + + is_exp_integer = ask(Q.integer(expr.exp), assumptions) + if is_exp_integer: + is_base_rational = ask(Q.rational(expr.base),assumptions) + if is_base_rational: + is_base_zero = ask(Q.zero(expr.base),assumptions) + if is_base_zero is False: + return True + if is_base_zero and ask(Q.positive(expr.exp)): + return True + if ask(Q.algebraic(expr.base),assumptions) is False: + return ask(Q.zero(expr.exp), assumptions) + if ask(Q.irrational(expr.base),assumptions) and ask(Q.eq(expr.exp,-1)): + return False + return + elif ask(Q.rational(expr.exp), assumptions): + if ask(Q.prime(expr.base), assumptions) and is_exp_integer is False: + return False + if ask(Q.zero(expr.base)) and ask(Q.positive(expr.exp)): + return True + if ask(Q.eq(expr.base,1)): + return True + +@RationalPredicate.register_many(asin, atan, cos, sin, tan) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.rational(x), assumptions): + return ask(~Q.nonzero(x), assumptions) + +@RationalPredicate.register(exp) +def _(expr, assumptions): + x = expr.exp + if ask(Q.rational(x), assumptions): + return ask(~Q.nonzero(x), assumptions) + +@RationalPredicate.register_many(acot, cot) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.rational(x), assumptions): + return False + +@RationalPredicate.register_many(acos, log) +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.rational(x), assumptions): + return ask(~Q.nonzero(x - 1), assumptions) + + +# IrrationalPredicate + +@IrrationalPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_irrational + if ret is None: + raise MDNotImplementedError + return ret + +@IrrationalPredicate.register(Basic) +def _(expr, assumptions): + _real = ask(Q.real(expr), assumptions) + if _real: + _rational = ask(Q.rational(expr), assumptions) + if _rational is None: + return None + return not _rational + else: + return _real + + +# RealPredicate + +def _RealPredicate_number(expr, assumptions): + # let as_real_imag() work first since the expression may + # be simpler to evaluate + i = expr.as_real_imag()[1].evalf(2) + if i._prec != 1: + return not i + # allow None to be returned if we couldn't show for sure + # that i was 0 + +@RealPredicate.register_many(Abs, Exp1, Float, GoldenRatio, im, Pi, Rational, + re, TribonacciConstant) +def _(expr, assumptions): + return True + +@RealPredicate.register_many(ImaginaryUnit, Infinity, NegativeInfinity) +def _(expr, assumptions): + return False + +@RealPredicate.register(Expr) +def _(expr, assumptions): + ret = expr.is_real + if ret is None: + raise MDNotImplementedError + return ret + +@RealPredicate.register(Add) +def _(expr, assumptions): + """ + * Real + Real -> Real + * Real + (Complex & !Real) -> !Real + """ + if expr.is_number: + return _RealPredicate_number(expr, assumptions) + return test_closed_group(expr, assumptions, Q.real) + +@RealPredicate.register(Mul) +def _(expr, assumptions): + """ + * Real*Real -> Real + * Real*Imaginary -> !Real + * Imaginary*Imaginary -> Real + """ + if expr.is_number: + return _RealPredicate_number(expr, assumptions) + result = True + for arg in expr.args: + if ask(Q.real(arg), assumptions): + pass + elif ask(Q.imaginary(arg), assumptions): + result = result ^ True + else: + break + else: + return result + +@RealPredicate.register(Pow) +def _(expr, assumptions): + """ + * Real**Integer -> Real + * Positive**Real -> Real + * Negative**Real -> ? + * Real**(Integer/Even) -> Real if base is nonnegative + * Real**(Integer/Odd) -> Real + * Imaginary**(Integer/Even) -> Real + * Imaginary**(Integer/Odd) -> not Real + * Imaginary**Real -> ? since Real could be 0 (giving real) + or 1 (giving imaginary) + * b**Imaginary -> Real if log(b) is imaginary and b != 0 + and exponent != integer multiple of + I*pi/log(b) + * Real**Real -> ? e.g. sqrt(-1) is imaginary and + sqrt(2) is not + """ + if expr.is_number: + return _RealPredicate_number(expr, assumptions) + + if expr.base == E: + return ask( + Q.integer(expr.exp/I/pi) | Q.real(expr.exp), assumptions + ) + + if expr.base.func == exp or (expr.base.is_Pow and expr.base.base == E): + if ask(Q.imaginary(expr.base.exp), assumptions): + if ask(Q.imaginary(expr.exp), assumptions): + return True + # If the i = (exp's arg)/(I*pi) is an integer or half-integer + # multiple of I*pi then 2*i will be an integer. In addition, + # exp(i*I*pi) = (-1)**i so the overall realness of the expr + # can be determined by replacing exp(i*I*pi) with (-1)**i. + i = expr.base.exp/I/pi + if ask(Q.integer(2*i), assumptions): + return ask(Q.real((S.NegativeOne**i)**expr.exp), assumptions) + return + + if ask(Q.imaginary(expr.base), assumptions): + if ask(Q.integer(expr.exp), assumptions): + odd = ask(Q.odd(expr.exp), assumptions) + if odd is not None: + return not odd + return + + if ask(Q.imaginary(expr.exp), assumptions): + imlog = ask(Q.imaginary(log(expr.base)), assumptions) + if imlog is not None: + # I**i -> real, log(I) is imag; + # (2*I)**i -> complex, log(2*I) is not imag + return imlog + + if ask(Q.real(expr.base), assumptions): + if ask(Q.real(expr.exp), assumptions): + if ask(Q.zero(expr.base), assumptions) is not False: + if ask(Q.positive(expr.exp), assumptions): + return True + return + if expr.exp.is_Rational and \ + ask(Q.even(expr.exp.q), assumptions): + return ask(Q.positive(expr.base), assumptions) + elif ask(Q.integer(expr.exp), assumptions): + return True + elif ask(Q.positive(expr.base), assumptions): + return True + +@RealPredicate.register_many(cos, sin) +def _(expr, assumptions): + if ask(Q.real(expr.args[0]), assumptions): + return True + +@RealPredicate.register(exp) +def _(expr, assumptions): + return ask( + Q.integer(expr.exp/I/pi) | Q.real(expr.exp), assumptions + ) + +@RealPredicate.register(log) +def _(expr, assumptions): + return ask(Q.positive(expr.args[0]), assumptions) + +@RealPredicate.register_many(Determinant, MatrixElement, Trace) +def _(expr, assumptions): + return ask(Q.real_elements(expr.args[0]), assumptions) + + +# ExtendedRealPredicate + +@ExtendedRealPredicate.register(object) +def _(expr, assumptions): + return ask(Q.negative_infinite(expr) + | Q.negative(expr) + | Q.zero(expr) + | Q.positive(expr) + | Q.positive_infinite(expr), + assumptions) + +@ExtendedRealPredicate.register_many(Infinity, NegativeInfinity) +def _(expr, assumptions): + return True + +@ExtendedRealPredicate.register_many(Add, Mul, Pow) # type:ignore +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.extended_real) + + +# HermitianPredicate + +@HermitianPredicate.register(object) # type:ignore +def _(expr, assumptions): + if isinstance(expr, MatrixBase): + return None + return ask(Q.real(expr), assumptions) + +@HermitianPredicate.register(Add) # type:ignore +def _(expr, assumptions): + """ + * Hermitian + Hermitian -> Hermitian + * Hermitian + !Hermitian -> !Hermitian + """ + if expr.is_number: + raise MDNotImplementedError + return test_closed_group(expr, assumptions, Q.hermitian) + +@HermitianPredicate.register(Mul) # type:ignore +def _(expr, assumptions): + """ + As long as there is at most only one noncommutative term: + + * Hermitian*Hermitian -> Hermitian + * Hermitian*Antihermitian -> !Hermitian + * Antihermitian*Antihermitian -> Hermitian + """ + if expr.is_number: + raise MDNotImplementedError + nccount = 0 + result = True + for arg in expr.args: + if ask(Q.antihermitian(arg), assumptions): + result = result ^ True + elif not ask(Q.hermitian(arg), assumptions): + break + if ask(~Q.commutative(arg), assumptions): + nccount += 1 + if nccount > 1: + break + else: + return result + +@HermitianPredicate.register(Pow) # type:ignore +def _(expr, assumptions): + """ + * Hermitian**Integer -> Hermitian + """ + if expr.is_number: + raise MDNotImplementedError + if expr.base == E: + if ask(Q.hermitian(expr.exp), assumptions): + return True + raise MDNotImplementedError + if ask(Q.hermitian(expr.base), assumptions): + if ask(Q.integer(expr.exp), assumptions): + return True + raise MDNotImplementedError + +@HermitianPredicate.register_many(cos, sin) # type:ignore +def _(expr, assumptions): + if ask(Q.hermitian(expr.args[0]), assumptions): + return True + raise MDNotImplementedError + +@HermitianPredicate.register(exp) # type:ignore +def _(expr, assumptions): + if ask(Q.hermitian(expr.exp), assumptions): + return True + raise MDNotImplementedError + +@HermitianPredicate.register(MatrixBase) # type:ignore +def _(mat, assumptions): + rows, cols = mat.shape + ret_val = True + for i in range(rows): + for j in range(i, cols): + cond = fuzzy_bool(Eq(mat[i, j], conjugate(mat[j, i]))) + if cond is None: + ret_val = None + if cond == False: + return False + if ret_val is None: + raise MDNotImplementedError + return ret_val + + +# ComplexPredicate + +@ComplexPredicate.register_many(Abs, cos, exp, im, ImaginaryUnit, log, Number, # type:ignore + NumberSymbol, re, sin) +def _(expr, assumptions): + return True + +@ComplexPredicate.register_many(Infinity, NegativeInfinity) # type:ignore +def _(expr, assumptions): + return False + +@ComplexPredicate.register(Expr) # type:ignore +def _(expr, assumptions): + ret = expr.is_complex + if ret is None: + raise MDNotImplementedError + return ret + +@ComplexPredicate.register_many(Add, Mul) # type:ignore +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.complex) + +@ComplexPredicate.register(Pow) # type:ignore +def _(expr, assumptions): + if expr.base == E: + return True + return test_closed_group(expr, assumptions, Q.complex) + +@ComplexPredicate.register_many(Determinant, MatrixElement, Trace) # type:ignore +def _(expr, assumptions): + return ask(Q.complex_elements(expr.args[0]), assumptions) + +@ComplexPredicate.register(NaN) # type:ignore +def _(expr, assumptions): + return None + + +# ImaginaryPredicate + +def _Imaginary_number(expr, assumptions): + # let as_real_imag() work first since the expression may + # be simpler to evaluate + r = expr.as_real_imag()[0].evalf(2) + if r._prec != 1: + return not r + # allow None to be returned if we couldn't show for sure + # that r was 0 + +@ImaginaryPredicate.register(ImaginaryUnit) # type:ignore +def _(expr, assumptions): + return True + +@ImaginaryPredicate.register(Expr) # type:ignore +def _(expr, assumptions): + ret = expr.is_imaginary + if ret is None: + raise MDNotImplementedError + return ret + +@ImaginaryPredicate.register(Add) # type:ignore +def _(expr, assumptions): + """ + * Imaginary + Imaginary -> Imaginary + * Imaginary + Complex -> ? + * Imaginary + Real -> !Imaginary + """ + if expr.is_number: + return _Imaginary_number(expr, assumptions) + + reals = 0 + for arg in expr.args: + if ask(Q.imaginary(arg), assumptions): + pass + elif ask(Q.real(arg), assumptions): + reals += 1 + else: + break + else: + if reals == 0: + return True + if reals in (1, len(expr.args)): + # two reals could sum 0 thus giving an imaginary + return False + +@ImaginaryPredicate.register(Mul) # type:ignore +def _(expr, assumptions): + """ + * Real*Imaginary -> Imaginary + * Imaginary*Imaginary -> Real + """ + if expr.is_number: + return _Imaginary_number(expr, assumptions) + result = False + reals = 0 + for arg in expr.args: + if ask(Q.imaginary(arg), assumptions): + result = result ^ True + elif not ask(Q.real(arg), assumptions): + break + else: + if reals == len(expr.args): + return False + return result + +@ImaginaryPredicate.register(Pow) # type:ignore +def _(expr, assumptions): + """ + * Imaginary**Odd -> Imaginary + * Imaginary**Even -> Real + * b**Imaginary -> !Imaginary if exponent is an integer + multiple of I*pi/log(b) + * Imaginary**Real -> ? + * Positive**Real -> Real + * Negative**Integer -> Real + * Negative**(Integer/2) -> Imaginary + * Negative**Real -> not Imaginary if exponent is not Rational + """ + if expr.is_number: + return _Imaginary_number(expr, assumptions) + + if expr.base == E: + a = expr.exp/I/pi + return ask(Q.integer(2*a) & ~Q.integer(a), assumptions) + + if expr.base.func == exp or (expr.base.is_Pow and expr.base.base == E): + if ask(Q.imaginary(expr.base.exp), assumptions): + if ask(Q.imaginary(expr.exp), assumptions): + return False + i = expr.base.exp/I/pi + if ask(Q.integer(2*i), assumptions): + return ask(Q.imaginary((S.NegativeOne**i)**expr.exp), assumptions) + + if ask(Q.imaginary(expr.base), assumptions): + if ask(Q.integer(expr.exp), assumptions): + odd = ask(Q.odd(expr.exp), assumptions) + if odd is not None: + return odd + return + + if ask(Q.imaginary(expr.exp), assumptions): + imlog = ask(Q.imaginary(log(expr.base)), assumptions) + if imlog is not None: + # I**i -> real; (2*I)**i -> complex ==> not imaginary + return False + + if ask(Q.real(expr.base) & Q.real(expr.exp), assumptions): + if ask(Q.positive(expr.base), assumptions): + return False + else: + rat = ask(Q.rational(expr.exp), assumptions) + if not rat: + return rat + if ask(Q.integer(expr.exp), assumptions): + return False + else: + half = ask(Q.integer(2*expr.exp), assumptions) + if half: + return ask(Q.negative(expr.base), assumptions) + return half + +@ImaginaryPredicate.register(log) # type:ignore +def _(expr, assumptions): + if ask(Q.real(expr.args[0]), assumptions): + if ask(Q.positive(expr.args[0]), assumptions): + return False + return + # XXX it should be enough to do + # return ask(Q.nonpositive(expr.args[0]), assumptions) + # but ask(Q.nonpositive(exp(x)), Q.imaginary(x)) -> None; + # it should return True since exp(x) will be either 0 or complex + if expr.args[0].func == exp or (expr.args[0].is_Pow and expr.args[0].base == E): + if expr.args[0].exp in [I, -I]: + return True + im = ask(Q.imaginary(expr.args[0]), assumptions) + if im is False: + return False + +@ImaginaryPredicate.register(exp) # type:ignore +def _(expr, assumptions): + a = expr.exp/I/pi + return ask(Q.integer(2*a) & ~Q.integer(a), assumptions) + +@ImaginaryPredicate.register_many(Number, NumberSymbol) # type:ignore +def _(expr, assumptions): + return not (expr.as_real_imag()[1] == 0) + +@ImaginaryPredicate.register(NaN) # type:ignore +def _(expr, assumptions): + return None + + +# AntihermitianPredicate + +@AntihermitianPredicate.register(object) # type:ignore +def _(expr, assumptions): + if isinstance(expr, MatrixBase): + return None + if ask(Q.zero(expr), assumptions): + return True + return ask(Q.imaginary(expr), assumptions) + +@AntihermitianPredicate.register(Add) # type:ignore +def _(expr, assumptions): + """ + * Antihermitian + Antihermitian -> Antihermitian + * Antihermitian + !Antihermitian -> !Antihermitian + """ + if expr.is_number: + raise MDNotImplementedError + return test_closed_group(expr, assumptions, Q.antihermitian) + +@AntihermitianPredicate.register(Mul) # type:ignore +def _(expr, assumptions): + """ + As long as there is at most only one noncommutative term: + + * Hermitian*Hermitian -> !Antihermitian + * Hermitian*Antihermitian -> Antihermitian + * Antihermitian*Antihermitian -> !Antihermitian + """ + if expr.is_number: + raise MDNotImplementedError + nccount = 0 + result = False + for arg in expr.args: + if ask(Q.antihermitian(arg), assumptions): + result = result ^ True + elif not ask(Q.hermitian(arg), assumptions): + break + if ask(~Q.commutative(arg), assumptions): + nccount += 1 + if nccount > 1: + break + else: + return result + +@AntihermitianPredicate.register(Pow) # type:ignore +def _(expr, assumptions): + """ + * Hermitian**Integer -> !Antihermitian + * Antihermitian**Even -> !Antihermitian + * Antihermitian**Odd -> Antihermitian + """ + if expr.is_number: + raise MDNotImplementedError + if ask(Q.hermitian(expr.base), assumptions): + if ask(Q.integer(expr.exp), assumptions): + return False + elif ask(Q.antihermitian(expr.base), assumptions): + if ask(Q.even(expr.exp), assumptions): + return False + elif ask(Q.odd(expr.exp), assumptions): + return True + raise MDNotImplementedError + +@AntihermitianPredicate.register(MatrixBase) # type:ignore +def _(mat, assumptions): + rows, cols = mat.shape + ret_val = True + for i in range(rows): + for j in range(i, cols): + cond = fuzzy_bool(Eq(mat[i, j], -conjugate(mat[j, i]))) + if cond is None: + ret_val = None + if cond == False: + return False + if ret_val is None: + raise MDNotImplementedError + return ret_val + + +# AlgebraicPredicate + +@AlgebraicPredicate.register_many(AlgebraicNumber, Float, GoldenRatio, # type:ignore + ImaginaryUnit, TribonacciConstant) +def _(expr, assumptions): + return True + +@AlgebraicPredicate.register_many(ComplexInfinity, Exp1, Infinity, # type:ignore + NegativeInfinity, Pi) +def _(expr, assumptions): + return False + +@AlgebraicPredicate.register_many(Add, Mul) # type:ignore +def _(expr, assumptions): + return test_closed_group(expr, assumptions, Q.algebraic) + +@AlgebraicPredicate.register(Pow) # type:ignore +def _(expr, assumptions): + if expr.base == E: + if ask(Q.algebraic(expr.exp), assumptions): + return ask(~Q.nonzero(expr.exp), assumptions) + return + if expr.base == pi: + if ask(Q.integer(expr.exp), assumptions) and ask(Q.positive(expr.exp), assumptions): + return False + return + exp_rational = ask(Q.rational(expr.exp), assumptions) + base_algebraic = ask(Q.algebraic(expr.base), assumptions) + exp_algebraic = ask(Q.algebraic(expr.exp),assumptions) + if base_algebraic and exp_algebraic: + if exp_rational: + return True + # Check based on the Gelfond-Schneider theorem: + # If the base is algebraic and not equal to 0 or 1, and the exponent + # is irrational,then the result is transcendental. + if ask(Q.ne(expr.base,0) & Q.ne(expr.base,1)) and exp_rational is False: + return False + +@AlgebraicPredicate.register(Rational) # type:ignore +def _(expr, assumptions): + return expr.q != 0 + +@AlgebraicPredicate.register_many(asin, atan, cos, sin, tan) # type:ignore +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.algebraic(x), assumptions): + return ask(~Q.nonzero(x), assumptions) + +@AlgebraicPredicate.register(exp) # type:ignore +def _(expr, assumptions): + x = expr.exp + if ask(Q.algebraic(x), assumptions): + return ask(~Q.nonzero(x), assumptions) + +@AlgebraicPredicate.register_many(acot, cot) # type:ignore +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.algebraic(x), assumptions): + return False + +@AlgebraicPredicate.register_many(acos, log) # type:ignore +def _(expr, assumptions): + x = expr.args[0] + if ask(Q.algebraic(x), assumptions): + return ask(~Q.nonzero(x - 1), assumptions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/lra_satask.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/lra_satask.py new file mode 100644 index 0000000000000000000000000000000000000000..53afe3e5abe99109ec01a47f19f1a8a4c99c5628 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/lra_satask.py @@ -0,0 +1,286 @@ +from sympy.assumptions.assume import global_assumptions +from sympy.assumptions.cnf import CNF, EncodedCNF +from sympy.assumptions.ask import Q +from sympy.logic.inference import satisfiable +from sympy.logic.algorithms.lra_theory import UnhandledInput, ALLOWED_PRED +from sympy.matrices.kind import MatrixKind +from sympy.core.kind import NumberKind +from sympy.assumptions.assume import AppliedPredicate +from sympy.core.mul import Mul +from sympy.core.singleton import S + + +def lra_satask(proposition, assumptions=True, context=global_assumptions): + """ + Function to evaluate the proposition with assumptions using SAT algorithm + in conjunction with an Linear Real Arithmetic theory solver. + + Used to handle inequalities. Should eventually be depreciated and combined + into satask, but infinity handling and other things need to be implemented + before that can happen. + """ + props = CNF.from_prop(proposition) + _props = CNF.from_prop(~proposition) + + cnf = CNF.from_prop(assumptions) + assumptions = EncodedCNF() + assumptions.from_cnf(cnf) + + context_cnf = CNF() + if context: + context_cnf = context_cnf.extend(context) + + assumptions.add_from_cnf(context_cnf) + + return check_satisfiability(props, _props, assumptions) + +# Some predicates such as Q.prime can't be handled by lra_satask. +# For example, (x > 0) & (x < 1) & Q.prime(x) is unsat but lra_satask would think it was sat. +# WHITE_LIST is a list of predicates that can always be handled. +WHITE_LIST = ALLOWED_PRED | {Q.positive, Q.negative, Q.zero, Q.nonzero, Q.nonpositive, Q.nonnegative, + Q.extended_positive, Q.extended_negative, Q.extended_nonpositive, + Q.extended_negative, Q.extended_nonzero, Q.negative_infinite, + Q.positive_infinite} + + +def check_satisfiability(prop, _prop, factbase): + sat_true = factbase.copy() + sat_false = factbase.copy() + sat_true.add_from_cnf(prop) + sat_false.add_from_cnf(_prop) + + all_pred, all_exprs = get_all_pred_and_expr_from_enc_cnf(sat_true) + + for pred in all_pred: + if pred.function not in WHITE_LIST and pred.function != Q.ne: + raise UnhandledInput(f"LRASolver: {pred} is an unhandled predicate") + for expr in all_exprs: + if expr.kind == MatrixKind(NumberKind): + raise UnhandledInput(f"LRASolver: {expr} is of MatrixKind") + if expr == S.NaN: + raise UnhandledInput("LRASolver: nan") + + # convert old assumptions into predicates and add them to sat_true and sat_false + # also check for unhandled predicates + for assm in extract_pred_from_old_assum(all_exprs): + n = len(sat_true.encoding) + if assm not in sat_true.encoding: + sat_true.encoding[assm] = n+1 + sat_true.data.append([sat_true.encoding[assm]]) + + n = len(sat_false.encoding) + if assm not in sat_false.encoding: + sat_false.encoding[assm] = n+1 + sat_false.data.append([sat_false.encoding[assm]]) + + + sat_true = _preprocess(sat_true) + sat_false = _preprocess(sat_false) + + can_be_true = satisfiable(sat_true, use_lra_theory=True) is not False + can_be_false = satisfiable(sat_false, use_lra_theory=True) is not False + + if can_be_true and can_be_false: + return None + + if can_be_true and not can_be_false: + return True + + if not can_be_true and can_be_false: + return False + + if not can_be_true and not can_be_false: + raise ValueError("Inconsistent assumptions") + + +def _preprocess(enc_cnf): + """ + Returns an encoded cnf with only Q.eq, Q.gt, Q.lt, + Q.ge, and Q.le predicate. + + Converts every unequality into a disjunction of strict + inequalities. For example, x != 3 would become + x < 3 OR x > 3. + + Also converts all negated Q.ne predicates into + equalities. + """ + + # loops through each literal in each clause + # to construct a new, preprocessed encodedCNF + + enc_cnf = enc_cnf.copy() + cur_enc = 1 + rev_encoding = {value: key for key, value in enc_cnf.encoding.items()} + + new_encoding = {} + new_data = [] + for clause in enc_cnf.data: + new_clause = [] + for lit in clause: + if lit == 0: + new_clause.append(lit) + new_encoding[lit] = False + continue + prop = rev_encoding[abs(lit)] + negated = lit < 0 + sign = (lit > 0) - (lit < 0) + + prop = _pred_to_binrel(prop) + + if not isinstance(prop, AppliedPredicate): + if prop not in new_encoding: + new_encoding[prop] = cur_enc + cur_enc += 1 + lit = new_encoding[prop] + new_clause.append(sign*lit) + continue + + + if negated and prop.function == Q.eq: + negated = False + prop = Q.ne(*prop.arguments) + + if prop.function == Q.ne: + arg1, arg2 = prop.arguments + if negated: + new_prop = Q.eq(arg1, arg2) + if new_prop not in new_encoding: + new_encoding[new_prop] = cur_enc + cur_enc += 1 + + new_enc = new_encoding[new_prop] + new_clause.append(new_enc) + continue + else: + new_props = (Q.gt(arg1, arg2), Q.lt(arg1, arg2)) + for new_prop in new_props: + if new_prop not in new_encoding: + new_encoding[new_prop] = cur_enc + cur_enc += 1 + + new_enc = new_encoding[new_prop] + new_clause.append(new_enc) + continue + + if prop.function == Q.eq and negated: + assert False + + if prop not in new_encoding: + new_encoding[prop] = cur_enc + cur_enc += 1 + new_clause.append(new_encoding[prop]*sign) + new_data.append(new_clause) + + assert len(new_encoding) >= cur_enc - 1 + + enc_cnf = EncodedCNF(new_data, new_encoding) + return enc_cnf + + +def _pred_to_binrel(pred): + if not isinstance(pred, AppliedPredicate): + return pred + + if pred.function in pred_to_pos_neg_zero: + f = pred_to_pos_neg_zero[pred.function] + if f is False: + return False + pred = f(pred.arguments[0]) + + if pred.function == Q.positive: + pred = Q.gt(pred.arguments[0], 0) + elif pred.function == Q.negative: + pred = Q.lt(pred.arguments[0], 0) + elif pred.function == Q.zero: + pred = Q.eq(pred.arguments[0], 0) + elif pred.function == Q.nonpositive: + pred = Q.le(pred.arguments[0], 0) + elif pred.function == Q.nonnegative: + pred = Q.ge(pred.arguments[0], 0) + elif pred.function == Q.nonzero: + pred = Q.ne(pred.arguments[0], 0) + + return pred + +pred_to_pos_neg_zero = { + Q.extended_positive: Q.positive, + Q.extended_negative: Q.negative, + Q.extended_nonpositive: Q.nonpositive, + Q.extended_negative: Q.negative, + Q.extended_nonzero: Q.nonzero, + Q.negative_infinite: False, + Q.positive_infinite: False +} + +def get_all_pred_and_expr_from_enc_cnf(enc_cnf): + all_exprs = set() + all_pred = set() + for pred in enc_cnf.encoding.keys(): + if isinstance(pred, AppliedPredicate): + all_pred.add(pred) + all_exprs.update(pred.arguments) + + return all_pred, all_exprs + +def extract_pred_from_old_assum(all_exprs): + """ + Returns a list of relevant new assumption predicate + based on any old assumptions. + + Raises an UnhandledInput exception if any of the assumptions are + unhandled. + + Ignored predicate: + - commutative + - complex + - algebraic + - transcendental + - extended_real + - real + - all matrix predicate + - rational + - irrational + + Example + ======= + >>> from sympy.assumptions.lra_satask import extract_pred_from_old_assum + >>> from sympy import symbols + >>> x, y = symbols("x y", positive=True) + >>> extract_pred_from_old_assum([x, y, 2]) + [Q.positive(x), Q.positive(y)] + """ + ret = [] + for expr in all_exprs: + if not hasattr(expr, "free_symbols"): + continue + if len(expr.free_symbols) == 0: + continue + + if expr.is_real is not True: + raise UnhandledInput(f"LRASolver: {expr} must be real") + # test for I times imaginary variable; such expressions are considered real + if isinstance(expr, Mul) and any(arg.is_real is not True for arg in expr.args): + raise UnhandledInput(f"LRASolver: {expr} must be real") + + if expr.is_integer == True and expr.is_zero != True: + raise UnhandledInput(f"LRASolver: {expr} is an integer") + if expr.is_integer == False: + raise UnhandledInput(f"LRASolver: {expr} can't be an integer") + if expr.is_rational == False: + raise UnhandledInput(f"LRASolver: {expr} is irational") + + if expr.is_zero: + ret.append(Q.zero(expr)) + elif expr.is_positive: + ret.append(Q.positive(expr)) + elif expr.is_negative: + ret.append(Q.negative(expr)) + elif expr.is_nonzero: + ret.append(Q.nonzero(expr)) + elif expr.is_nonpositive: + ret.append(Q.nonpositive(expr)) + elif expr.is_nonnegative: + ret.append(Q.nonnegative(expr)) + + return ret diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8e294544bfdce13633ecff762ff42861aa12719f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/__init__.py @@ -0,0 +1,5 @@ +""" +Module to implement predicate classes. + +Class of every predicate registered to ``Q`` is defined here. +""" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/calculus.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/calculus.py new file mode 100644 index 0000000000000000000000000000000000000000..f300703788683c07649ee3a0afd6e9d4eabd4567 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/calculus.py @@ -0,0 +1,82 @@ +from sympy.assumptions import Predicate +from sympy.multipledispatch import Dispatcher + +class FinitePredicate(Predicate): + """ + Finite number predicate. + + Explanation + =========== + + ``Q.finite(x)`` is true if ``x`` is a number but neither an infinity + nor a ``NaN``. In other words, ``ask(Q.finite(x))`` is true for all + numerical ``x`` having a bounded absolute value. + + Examples + ======== + + >>> from sympy import Q, ask, S, oo, I, zoo + >>> from sympy.abc import x + >>> ask(Q.finite(oo)) + False + >>> ask(Q.finite(-oo)) + False + >>> ask(Q.finite(zoo)) + False + >>> ask(Q.finite(1)) + True + >>> ask(Q.finite(2 + 3*I)) + True + >>> ask(Q.finite(x), Q.positive(x)) + True + >>> print(ask(Q.finite(S.NaN))) + None + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Finite + + """ + name = 'finite' + handler = Dispatcher( + "FiniteHandler", + doc=("Handler for Q.finite. Test that an expression is bounded respect" + " to all its variables.") + ) + + +class InfinitePredicate(Predicate): + """ + Infinite number predicate. + + ``Q.infinite(x)`` is true iff the absolute value of ``x`` is + infinity. + + """ + # TODO: Add examples + name = 'infinite' + handler = Dispatcher( + "InfiniteHandler", + doc="""Handler for Q.infinite key.""" + ) + + +class PositiveInfinitePredicate(Predicate): + """ + Positive infinity predicate. + + ``Q.positive_infinite(x)`` is true iff ``x`` is positive infinity ``oo``. + """ + name = 'positive_infinite' + handler = Dispatcher("PositiveInfiniteHandler") + + +class NegativeInfinitePredicate(Predicate): + """ + Negative infinity predicate. + + ``Q.negative_infinite(x)`` is true iff ``x`` is negative infinity ``-oo``. + """ + name = 'negative_infinite' + handler = Dispatcher("NegativeInfiniteHandler") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/common.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/common.py new file mode 100644 index 0000000000000000000000000000000000000000..a53892747131b03636abeb8f563c4f76cf3e281e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/common.py @@ -0,0 +1,81 @@ +from sympy.assumptions import Predicate, AppliedPredicate, Q +from sympy.core.relational import Eq, Ne, Gt, Lt, Ge, Le +from sympy.multipledispatch import Dispatcher + + +class CommutativePredicate(Predicate): + """ + Commutative predicate. + + Explanation + =========== + + ``ask(Q.commutative(x))`` is true iff ``x`` commutes with any other + object with respect to multiplication operation. + + """ + # TODO: Add examples + name = 'commutative' + handler = Dispatcher("CommutativeHandler", doc="Handler for key 'commutative'.") + + +binrelpreds = {Eq: Q.eq, Ne: Q.ne, Gt: Q.gt, Lt: Q.lt, Ge: Q.ge, Le: Q.le} + +class IsTruePredicate(Predicate): + """ + Generic predicate. + + Explanation + =========== + + ``ask(Q.is_true(x))`` is true iff ``x`` is true. This only makes + sense if ``x`` is a boolean object. + + Examples + ======== + + >>> from sympy import ask, Q + >>> from sympy.abc import x, y + >>> ask(Q.is_true(True)) + True + + Wrapping another applied predicate just returns the applied predicate. + + >>> Q.is_true(Q.even(x)) + Q.even(x) + + Wrapping binary relation classes in SymPy core returns applied binary + relational predicates. + + >>> from sympy import Eq, Gt + >>> Q.is_true(Eq(x, y)) + Q.eq(x, y) + >>> Q.is_true(Gt(x, y)) + Q.gt(x, y) + + Notes + ===== + + This class is designed to wrap the boolean objects so that they can + behave as if they are applied predicates. Consequently, wrapping another + applied predicate is unnecessary and thus it just returns the argument. + Also, binary relation classes in SymPy core have binary predicates to + represent themselves and thus wrapping them with ``Q.is_true`` converts them + to these applied predicates. + + """ + name = 'is_true' + handler = Dispatcher( + "IsTrueHandler", + doc="Wrapper allowing to query the truth value of a boolean expression." + ) + + def __call__(self, arg): + # No need to wrap another predicate + if isinstance(arg, AppliedPredicate): + return arg + # Convert relational predicates instead of wrapping them + if getattr(arg, "is_Relational", False): + pred = binrelpreds[type(arg)] + return pred(*arg.args) + return super().__call__(arg) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/matrices.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..151e78c4ff345800e1d2f17973fb0591b8d379d2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/matrices.py @@ -0,0 +1,511 @@ +from sympy.assumptions import Predicate +from sympy.multipledispatch import Dispatcher + +class SquarePredicate(Predicate): + """ + Square matrix predicate. + + Explanation + =========== + + ``Q.square(x)`` is true iff ``x`` is a square matrix. A square matrix + is a matrix with the same number of rows and columns. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix, Identity + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('X', 2, 3) + >>> ask(Q.square(X)) + True + >>> ask(Q.square(Y)) + False + >>> ask(Q.square(ZeroMatrix(3, 3))) + True + >>> ask(Q.square(Identity(3))) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Square_matrix + + """ + name = 'square' + handler = Dispatcher("SquareHandler", doc="Handler for Q.square.") + + +class SymmetricPredicate(Predicate): + """ + Symmetric matrix predicate. + + Explanation + =========== + + ``Q.symmetric(x)`` is true iff ``x`` is a square matrix and is equal to + its transpose. Every square diagonal matrix is a symmetric matrix. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('Y', 2, 3) + >>> Z = MatrixSymbol('Z', 2, 2) + >>> ask(Q.symmetric(X*Z), Q.symmetric(X) & Q.symmetric(Z)) + True + >>> ask(Q.symmetric(X + Z), Q.symmetric(X) & Q.symmetric(Z)) + True + >>> ask(Q.symmetric(Y)) + False + + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Symmetric_matrix + + """ + # TODO: Add handlers to make these keys work with + # actual matrices and add more examples in the docstring. + name = 'symmetric' + handler = Dispatcher("SymmetricHandler", doc="Handler for Q.symmetric.") + + +class InvertiblePredicate(Predicate): + """ + Invertible matrix predicate. + + Explanation + =========== + + ``Q.invertible(x)`` is true iff ``x`` is an invertible matrix. + A square matrix is called invertible only if its determinant is 0. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('Y', 2, 3) + >>> Z = MatrixSymbol('Z', 2, 2) + >>> ask(Q.invertible(X*Y), Q.invertible(X)) + False + >>> ask(Q.invertible(X*Z), Q.invertible(X) & Q.invertible(Z)) + True + >>> ask(Q.invertible(X), Q.fullrank(X) & Q.square(X)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Invertible_matrix + + """ + name = 'invertible' + handler = Dispatcher("InvertibleHandler", doc="Handler for Q.invertible.") + + +class OrthogonalPredicate(Predicate): + """ + Orthogonal matrix predicate. + + Explanation + =========== + + ``Q.orthogonal(x)`` is true iff ``x`` is an orthogonal matrix. + A square matrix ``M`` is an orthogonal matrix if it satisfies + ``M^TM = MM^T = I`` where ``M^T`` is the transpose matrix of + ``M`` and ``I`` is an identity matrix. Note that an orthogonal + matrix is necessarily invertible. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, Identity + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('Y', 2, 3) + >>> Z = MatrixSymbol('Z', 2, 2) + >>> ask(Q.orthogonal(Y)) + False + >>> ask(Q.orthogonal(X*Z*X), Q.orthogonal(X) & Q.orthogonal(Z)) + True + >>> ask(Q.orthogonal(Identity(3))) + True + >>> ask(Q.invertible(X), Q.orthogonal(X)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Orthogonal_matrix + + """ + name = 'orthogonal' + handler = Dispatcher("OrthogonalHandler", doc="Handler for key 'orthogonal'.") + + +class UnitaryPredicate(Predicate): + """ + Unitary matrix predicate. + + Explanation + =========== + + ``Q.unitary(x)`` is true iff ``x`` is a unitary matrix. + Unitary matrix is an analogue to orthogonal matrix. A square + matrix ``M`` with complex elements is unitary if :math:``M^TM = MM^T= I`` + where :math:``M^T`` is the conjugate transpose matrix of ``M``. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, Identity + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('Y', 2, 3) + >>> Z = MatrixSymbol('Z', 2, 2) + >>> ask(Q.unitary(Y)) + False + >>> ask(Q.unitary(X*Z*X), Q.unitary(X) & Q.unitary(Z)) + True + >>> ask(Q.unitary(Identity(3))) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Unitary_matrix + + """ + name = 'unitary' + handler = Dispatcher("UnitaryHandler", doc="Handler for key 'unitary'.") + + +class FullRankPredicate(Predicate): + """ + Fullrank matrix predicate. + + Explanation + =========== + + ``Q.fullrank(x)`` is true iff ``x`` is a full rank matrix. + A matrix is full rank if all rows and columns of the matrix + are linearly independent. A square matrix is full rank iff + its determinant is nonzero. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix, Identity + >>> X = MatrixSymbol('X', 2, 2) + >>> ask(Q.fullrank(X.T), Q.fullrank(X)) + True + >>> ask(Q.fullrank(ZeroMatrix(3, 3))) + False + >>> ask(Q.fullrank(Identity(3))) + True + + """ + name = 'fullrank' + handler = Dispatcher("FullRankHandler", doc="Handler for key 'fullrank'.") + + +class PositiveDefinitePredicate(Predicate): + r""" + Positive definite matrix predicate. + + Explanation + =========== + + If $M$ is a :math:`n \times n` symmetric real matrix, it is said + to be positive definite if :math:`Z^TMZ` is positive for + every non-zero column vector $Z$ of $n$ real numbers. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, Identity + >>> X = MatrixSymbol('X', 2, 2) + >>> Y = MatrixSymbol('Y', 2, 3) + >>> Z = MatrixSymbol('Z', 2, 2) + >>> ask(Q.positive_definite(Y)) + False + >>> ask(Q.positive_definite(Identity(3))) + True + >>> ask(Q.positive_definite(X + Z), Q.positive_definite(X) & + ... Q.positive_definite(Z)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Positive-definite_matrix + + """ + name = "positive_definite" + handler = Dispatcher("PositiveDefiniteHandler", doc="Handler for key 'positive_definite'.") + + +class UpperTriangularPredicate(Predicate): + """ + Upper triangular matrix predicate. + + Explanation + =========== + + A matrix $M$ is called upper triangular matrix if :math:`M_{ij}=0` + for :math:`i>> from sympy import Q, ask, ZeroMatrix, Identity + >>> ask(Q.upper_triangular(Identity(3))) + True + >>> ask(Q.upper_triangular(ZeroMatrix(3, 3))) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/UpperTriangularMatrix.html + + """ + name = "upper_triangular" + handler = Dispatcher("UpperTriangularHandler", doc="Handler for key 'upper_triangular'.") + + +class LowerTriangularPredicate(Predicate): + """ + Lower triangular matrix predicate. + + Explanation + =========== + + A matrix $M$ is called lower triangular matrix if :math:`M_{ij}=0` + for :math:`i>j`. + + Examples + ======== + + >>> from sympy import Q, ask, ZeroMatrix, Identity + >>> ask(Q.lower_triangular(Identity(3))) + True + >>> ask(Q.lower_triangular(ZeroMatrix(3, 3))) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/LowerTriangularMatrix.html + + """ + name = "lower_triangular" + handler = Dispatcher("LowerTriangularHandler", doc="Handler for key 'lower_triangular'.") + + +class DiagonalPredicate(Predicate): + """ + Diagonal matrix predicate. + + Explanation + =========== + + ``Q.diagonal(x)`` is true iff ``x`` is a diagonal matrix. A diagonal + matrix is a matrix in which the entries outside the main diagonal + are all zero. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix + >>> X = MatrixSymbol('X', 2, 2) + >>> ask(Q.diagonal(ZeroMatrix(3, 3))) + True + >>> ask(Q.diagonal(X), Q.lower_triangular(X) & + ... Q.upper_triangular(X)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Diagonal_matrix + + """ + name = "diagonal" + handler = Dispatcher("DiagonalHandler", doc="Handler for key 'diagonal'.") + + +class IntegerElementsPredicate(Predicate): + """ + Integer elements matrix predicate. + + Explanation + =========== + + ``Q.integer_elements(x)`` is true iff all the elements of ``x`` + are integers. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.integer(X[1, 2]), Q.integer_elements(X)) + True + + """ + name = "integer_elements" + handler = Dispatcher("IntegerElementsHandler", doc="Handler for key 'integer_elements'.") + + +class RealElementsPredicate(Predicate): + """ + Real elements matrix predicate. + + Explanation + =========== + + ``Q.real_elements(x)`` is true iff all the elements of ``x`` + are real numbers. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.real(X[1, 2]), Q.real_elements(X)) + True + + """ + name = "real_elements" + handler = Dispatcher("RealElementsHandler", doc="Handler for key 'real_elements'.") + + +class ComplexElementsPredicate(Predicate): + """ + Complex elements matrix predicate. + + Explanation + =========== + + ``Q.complex_elements(x)`` is true iff all the elements of ``x`` + are complex numbers. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.complex(X[1, 2]), Q.complex_elements(X)) + True + >>> ask(Q.complex_elements(X), Q.integer_elements(X)) + True + + """ + name = "complex_elements" + handler = Dispatcher("ComplexElementsHandler", doc="Handler for key 'complex_elements'.") + + +class SingularPredicate(Predicate): + """ + Singular matrix predicate. + + A matrix is singular iff the value of its determinant is 0. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.singular(X), Q.invertible(X)) + False + >>> ask(Q.singular(X), ~Q.invertible(X)) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/SingularMatrix.html + + """ + name = "singular" + handler = Dispatcher("SingularHandler", doc="Predicate fore key 'singular'.") + + +class NormalPredicate(Predicate): + """ + Normal matrix predicate. + + A matrix is normal if it commutes with its conjugate transpose. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.normal(X), Q.unitary(X)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Normal_matrix + + """ + name = "normal" + handler = Dispatcher("NormalHandler", doc="Predicate fore key 'normal'.") + + +class TriangularPredicate(Predicate): + """ + Triangular matrix predicate. + + Explanation + =========== + + ``Q.triangular(X)`` is true if ``X`` is one that is either lower + triangular or upper triangular. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.triangular(X), Q.upper_triangular(X)) + True + >>> ask(Q.triangular(X), Q.lower_triangular(X)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Triangular_matrix + + """ + name = "triangular" + handler = Dispatcher("TriangularHandler", doc="Predicate fore key 'triangular'.") + + +class UnitTriangularPredicate(Predicate): + """ + Unit triangular matrix predicate. + + Explanation + =========== + + A unit triangular matrix is a triangular matrix with 1s + on the diagonal. + + Examples + ======== + + >>> from sympy import Q, ask, MatrixSymbol + >>> X = MatrixSymbol('X', 4, 4) + >>> ask(Q.triangular(X), Q.unit_triangular(X)) + True + + """ + name = "unit_triangular" + handler = Dispatcher("UnitTriangularHandler", doc="Predicate fore key 'unit_triangular'.") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/ntheory.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/ntheory.py new file mode 100644 index 0000000000000000000000000000000000000000..6c598e0ed1bd4a1170aa28044f9ae6de2fa1a1e0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/ntheory.py @@ -0,0 +1,126 @@ +from sympy.assumptions import Predicate +from sympy.multipledispatch import Dispatcher + + +class PrimePredicate(Predicate): + """ + Prime number predicate. + + Explanation + =========== + + ``ask(Q.prime(x))`` is true iff ``x`` is a natural number greater + than 1 that has no positive divisors other than ``1`` and the + number itself. + + Examples + ======== + + >>> from sympy import Q, ask + >>> ask(Q.prime(0)) + False + >>> ask(Q.prime(1)) + False + >>> ask(Q.prime(2)) + True + >>> ask(Q.prime(20)) + False + >>> ask(Q.prime(-3)) + False + + """ + name = 'prime' + handler = Dispatcher( + "PrimeHandler", + doc=("Handler for key 'prime'. Test that an expression represents a prime" + " number. When the expression is an exact number, the result (when True)" + " is subject to the limitations of isprime() which is used to return the " + "result.") + ) + + +class CompositePredicate(Predicate): + """ + Composite number predicate. + + Explanation + =========== + + ``ask(Q.composite(x))`` is true iff ``x`` is a positive integer and has + at least one positive divisor other than ``1`` and the number itself. + + Examples + ======== + + >>> from sympy import Q, ask + >>> ask(Q.composite(0)) + False + >>> ask(Q.composite(1)) + False + >>> ask(Q.composite(2)) + False + >>> ask(Q.composite(20)) + True + + """ + name = 'composite' + handler = Dispatcher("CompositeHandler", doc="Handler for key 'composite'.") + + +class EvenPredicate(Predicate): + """ + Even number predicate. + + Explanation + =========== + + ``ask(Q.even(x))`` is true iff ``x`` belongs to the set of even + integers. + + Examples + ======== + + >>> from sympy import Q, ask, pi + >>> ask(Q.even(0)) + True + >>> ask(Q.even(2)) + True + >>> ask(Q.even(3)) + False + >>> ask(Q.even(pi)) + False + + """ + name = 'even' + handler = Dispatcher("EvenHandler", doc="Handler for key 'even'.") + + +class OddPredicate(Predicate): + """ + Odd number predicate. + + Explanation + =========== + + ``ask(Q.odd(x))`` is true iff ``x`` belongs to the set of odd numbers. + + Examples + ======== + + >>> from sympy import Q, ask, pi + >>> ask(Q.odd(0)) + False + >>> ask(Q.odd(2)) + False + >>> ask(Q.odd(3)) + True + >>> ask(Q.odd(pi)) + False + + """ + name = 'odd' + handler = Dispatcher( + "OddHandler", + doc=("Handler for key 'odd'. Test that an expression represents an odd" + " number.") + ) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/order.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/order.py new file mode 100644 index 0000000000000000000000000000000000000000..86bfb2ae49789efd5b0df99e2cfc63984e956dd0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/order.py @@ -0,0 +1,390 @@ +from sympy.assumptions import Predicate +from sympy.multipledispatch import Dispatcher + + +class NegativePredicate(Predicate): + r""" + Negative number predicate. + + Explanation + =========== + + ``Q.negative(x)`` is true iff ``x`` is a real number and :math:`x < 0`, that is, + it is in the interval :math:`(-\infty, 0)`. Note in particular that negative + infinity is not negative. + + A few important facts about negative numbers: + + - Note that ``Q.nonnegative`` and ``~Q.negative`` are *not* the same + thing. ``~Q.negative(x)`` simply means that ``x`` is not negative, + whereas ``Q.nonnegative(x)`` means that ``x`` is real and not + negative, i.e., ``Q.nonnegative(x)`` is logically equivalent to + ``Q.zero(x) | Q.positive(x)``. So for example, ``~Q.negative(I)`` is + true, whereas ``Q.nonnegative(I)`` is false. + + - See the documentation of ``Q.real`` for more information about + related facts. + + Examples + ======== + + >>> from sympy import Q, ask, symbols, I + >>> x = symbols('x') + >>> ask(Q.negative(x), Q.real(x) & ~Q.positive(x) & ~Q.zero(x)) + True + >>> ask(Q.negative(-1)) + True + >>> ask(Q.nonnegative(I)) + False + >>> ask(~Q.negative(I)) + True + + """ + name = 'negative' + handler = Dispatcher( + "NegativeHandler", + doc=("Handler for Q.negative. Test that an expression is strictly less" + " than zero.") + ) + + +class NonNegativePredicate(Predicate): + """ + Nonnegative real number predicate. + + Explanation + =========== + + ``ask(Q.nonnegative(x))`` is true iff ``x`` belongs to the set of + positive numbers including zero. + + - Note that ``Q.nonnegative`` and ``~Q.negative`` are *not* the same + thing. ``~Q.negative(x)`` simply means that ``x`` is not negative, + whereas ``Q.nonnegative(x)`` means that ``x`` is real and not + negative, i.e., ``Q.nonnegative(x)`` is logically equivalent to + ``Q.zero(x) | Q.positive(x)``. So for example, ``~Q.negative(I)`` is + true, whereas ``Q.nonnegative(I)`` is false. + + Examples + ======== + + >>> from sympy import Q, ask, I + >>> ask(Q.nonnegative(1)) + True + >>> ask(Q.nonnegative(0)) + True + >>> ask(Q.nonnegative(-1)) + False + >>> ask(Q.nonnegative(I)) + False + >>> ask(Q.nonnegative(-I)) + False + + """ + name = 'nonnegative' + handler = Dispatcher( + "NonNegativeHandler", + doc=("Handler for Q.nonnegative.") + ) + + +class NonZeroPredicate(Predicate): + """ + Nonzero real number predicate. + + Explanation + =========== + + ``ask(Q.nonzero(x))`` is true iff ``x`` is real and ``x`` is not zero. Note in + particular that ``Q.nonzero(x)`` is false if ``x`` is not real. Use + ``~Q.zero(x)`` if you want the negation of being zero without any real + assumptions. + + A few important facts about nonzero numbers: + + - ``Q.nonzero`` is logically equivalent to ``Q.positive | Q.negative``. + + - See the documentation of ``Q.real`` for more information about + related facts. + + Examples + ======== + + >>> from sympy import Q, ask, symbols, I, oo + >>> x = symbols('x') + >>> print(ask(Q.nonzero(x), ~Q.zero(x))) + None + >>> ask(Q.nonzero(x), Q.positive(x)) + True + >>> ask(Q.nonzero(x), Q.zero(x)) + False + >>> ask(Q.nonzero(0)) + False + >>> ask(Q.nonzero(I)) + False + >>> ask(~Q.zero(I)) + True + >>> ask(Q.nonzero(oo)) + False + + """ + name = 'nonzero' + handler = Dispatcher( + "NonZeroHandler", + doc=("Handler for key 'nonzero'. Test that an expression is not identically" + " zero.") + ) + + +class ZeroPredicate(Predicate): + """ + Zero number predicate. + + Explanation + =========== + + ``ask(Q.zero(x))`` is true iff the value of ``x`` is zero. + + Examples + ======== + + >>> from sympy import ask, Q, oo, symbols + >>> x, y = symbols('x, y') + >>> ask(Q.zero(0)) + True + >>> ask(Q.zero(1/oo)) + True + >>> print(ask(Q.zero(0*oo))) + None + >>> ask(Q.zero(1)) + False + >>> ask(Q.zero(x*y), Q.zero(x) | Q.zero(y)) + True + + """ + name = 'zero' + handler = Dispatcher( + "ZeroHandler", + doc="Handler for key 'zero'." + ) + + +class NonPositivePredicate(Predicate): + """ + Nonpositive real number predicate. + + Explanation + =========== + + ``ask(Q.nonpositive(x))`` is true iff ``x`` belongs to the set of + negative numbers including zero. + + - Note that ``Q.nonpositive`` and ``~Q.positive`` are *not* the same + thing. ``~Q.positive(x)`` simply means that ``x`` is not positive, + whereas ``Q.nonpositive(x)`` means that ``x`` is real and not + positive, i.e., ``Q.nonpositive(x)`` is logically equivalent to + `Q.negative(x) | Q.zero(x)``. So for example, ``~Q.positive(I)`` is + true, whereas ``Q.nonpositive(I)`` is false. + + Examples + ======== + + >>> from sympy import Q, ask, I + + >>> ask(Q.nonpositive(-1)) + True + >>> ask(Q.nonpositive(0)) + True + >>> ask(Q.nonpositive(1)) + False + >>> ask(Q.nonpositive(I)) + False + >>> ask(Q.nonpositive(-I)) + False + + """ + name = 'nonpositive' + handler = Dispatcher( + "NonPositiveHandler", + doc="Handler for key 'nonpositive'." + ) + + +class PositivePredicate(Predicate): + r""" + Positive real number predicate. + + Explanation + =========== + + ``Q.positive(x)`` is true iff ``x`` is real and `x > 0`, that is if ``x`` + is in the interval `(0, \infty)`. In particular, infinity is not + positive. + + A few important facts about positive numbers: + + - Note that ``Q.nonpositive`` and ``~Q.positive`` are *not* the same + thing. ``~Q.positive(x)`` simply means that ``x`` is not positive, + whereas ``Q.nonpositive(x)`` means that ``x`` is real and not + positive, i.e., ``Q.nonpositive(x)`` is logically equivalent to + `Q.negative(x) | Q.zero(x)``. So for example, ``~Q.positive(I)`` is + true, whereas ``Q.nonpositive(I)`` is false. + + - See the documentation of ``Q.real`` for more information about + related facts. + + Examples + ======== + + >>> from sympy import Q, ask, symbols, I + >>> x = symbols('x') + >>> ask(Q.positive(x), Q.real(x) & ~Q.negative(x) & ~Q.zero(x)) + True + >>> ask(Q.positive(1)) + True + >>> ask(Q.nonpositive(I)) + False + >>> ask(~Q.positive(I)) + True + + """ + name = 'positive' + handler = Dispatcher( + "PositiveHandler", + doc=("Handler for key 'positive'. Test that an expression is strictly" + " greater than zero.") + ) + + +class ExtendedPositivePredicate(Predicate): + r""" + Positive extended real number predicate. + + Explanation + =========== + + ``Q.extended_positive(x)`` is true iff ``x`` is extended real and + `x > 0`, that is if ``x`` is in the interval `(0, \infty]`. + + Examples + ======== + + >>> from sympy import ask, I, oo, Q + >>> ask(Q.extended_positive(1)) + True + >>> ask(Q.extended_positive(oo)) + True + >>> ask(Q.extended_positive(I)) + False + + """ + name = 'extended_positive' + handler = Dispatcher("ExtendedPositiveHandler") + + +class ExtendedNegativePredicate(Predicate): + r""" + Negative extended real number predicate. + + Explanation + =========== + + ``Q.extended_negative(x)`` is true iff ``x`` is extended real and + `x < 0`, that is if ``x`` is in the interval `[-\infty, 0)`. + + Examples + ======== + + >>> from sympy import ask, I, oo, Q + >>> ask(Q.extended_negative(-1)) + True + >>> ask(Q.extended_negative(-oo)) + True + >>> ask(Q.extended_negative(-I)) + False + + """ + name = 'extended_negative' + handler = Dispatcher("ExtendedNegativeHandler") + + +class ExtendedNonZeroPredicate(Predicate): + """ + Nonzero extended real number predicate. + + Explanation + =========== + + ``ask(Q.extended_nonzero(x))`` is true iff ``x`` is extended real and + ``x`` is not zero. + + Examples + ======== + + >>> from sympy import ask, I, oo, Q + >>> ask(Q.extended_nonzero(-1)) + True + >>> ask(Q.extended_nonzero(oo)) + True + >>> ask(Q.extended_nonzero(I)) + False + + """ + name = 'extended_nonzero' + handler = Dispatcher("ExtendedNonZeroHandler") + + +class ExtendedNonPositivePredicate(Predicate): + """ + Nonpositive extended real number predicate. + + Explanation + =========== + + ``ask(Q.extended_nonpositive(x))`` is true iff ``x`` is extended real and + ``x`` is not positive. + + Examples + ======== + + >>> from sympy import ask, I, oo, Q + >>> ask(Q.extended_nonpositive(-1)) + True + >>> ask(Q.extended_nonpositive(oo)) + False + >>> ask(Q.extended_nonpositive(0)) + True + >>> ask(Q.extended_nonpositive(I)) + False + + """ + name = 'extended_nonpositive' + handler = Dispatcher("ExtendedNonPositiveHandler") + + +class ExtendedNonNegativePredicate(Predicate): + """ + Nonnegative extended real number predicate. + + Explanation + =========== + + ``ask(Q.extended_nonnegative(x))`` is true iff ``x`` is extended real and + ``x`` is not negative. + + Examples + ======== + + >>> from sympy import ask, I, oo, Q + >>> ask(Q.extended_nonnegative(-1)) + False + >>> ask(Q.extended_nonnegative(oo)) + True + >>> ask(Q.extended_nonnegative(0)) + True + >>> ask(Q.extended_nonnegative(I)) + False + + """ + name = 'extended_nonnegative' + handler = Dispatcher("ExtendedNonNegativeHandler") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/sets.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/sets.py new file mode 100644 index 0000000000000000000000000000000000000000..18261cee2d9de65df14a31a56b2cd22328328ed0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/predicates/sets.py @@ -0,0 +1,399 @@ +from sympy.assumptions import Predicate +from sympy.multipledispatch import Dispatcher + + +class IntegerPredicate(Predicate): + """ + Integer predicate. + + Explanation + =========== + + ``Q.integer(x)`` is true iff ``x`` belongs to the set of integer + numbers. + + Examples + ======== + + >>> from sympy import Q, ask, S + >>> ask(Q.integer(5)) + True + >>> ask(Q.integer(S(1)/2)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Integer + + """ + name = 'integer' + handler = Dispatcher( + "IntegerHandler", + doc=("Handler for Q.integer.\n\n" + "Test that an expression belongs to the field of integer numbers.") + ) + + +class NonIntegerPredicate(Predicate): + """ + Non-integer extended real predicate. + """ + name = 'noninteger' + handler = Dispatcher( + "NonIntegerHandler", + doc=("Handler for Q.noninteger.\n\n" + "Test that an expression is a non-integer extended real number.") + ) + + +class RationalPredicate(Predicate): + """ + Rational number predicate. + + Explanation + =========== + + ``Q.rational(x)`` is true iff ``x`` belongs to the set of + rational numbers. + + Examples + ======== + + >>> from sympy import ask, Q, pi, S + >>> ask(Q.rational(0)) + True + >>> ask(Q.rational(S(1)/2)) + True + >>> ask(Q.rational(pi)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Rational_number + + """ + name = 'rational' + handler = Dispatcher( + "RationalHandler", + doc=("Handler for Q.rational.\n\n" + "Test that an expression belongs to the field of rational numbers.") + ) + + +class IrrationalPredicate(Predicate): + """ + Irrational number predicate. + + Explanation + =========== + + ``Q.irrational(x)`` is true iff ``x`` is any real number that + cannot be expressed as a ratio of integers. + + Examples + ======== + + >>> from sympy import ask, Q, pi, S, I + >>> ask(Q.irrational(0)) + False + >>> ask(Q.irrational(S(1)/2)) + False + >>> ask(Q.irrational(pi)) + True + >>> ask(Q.irrational(I)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Irrational_number + + """ + name = 'irrational' + handler = Dispatcher( + "IrrationalHandler", + doc=("Handler for Q.irrational.\n\n" + "Test that an expression is irrational numbers.") + ) + + +class RealPredicate(Predicate): + r""" + Real number predicate. + + Explanation + =========== + + ``Q.real(x)`` is true iff ``x`` is a real number, i.e., it is in the + interval `(-\infty, \infty)`. Note that, in particular the + infinities are not real. Use ``Q.extended_real`` if you want to + consider those as well. + + A few important facts about reals: + + - Every real number is positive, negative, or zero. Furthermore, + because these sets are pairwise disjoint, each real number is + exactly one of those three. + + - Every real number is also complex. + + - Every real number is finite. + + - Every real number is either rational or irrational. + + - Every real number is either algebraic or transcendental. + + - The facts ``Q.negative``, ``Q.zero``, ``Q.positive``, + ``Q.nonnegative``, ``Q.nonpositive``, ``Q.nonzero``, + ``Q.integer``, ``Q.rational``, and ``Q.irrational`` all imply + ``Q.real``, as do all facts that imply those facts. + + - The facts ``Q.algebraic``, and ``Q.transcendental`` do not imply + ``Q.real``; they imply ``Q.complex``. An algebraic or + transcendental number may or may not be real. + + - The "non" facts (i.e., ``Q.nonnegative``, ``Q.nonzero``, + ``Q.nonpositive`` and ``Q.noninteger``) are not equivalent to + not the fact, but rather, not the fact *and* ``Q.real``. + For example, ``Q.nonnegative`` means ``~Q.negative & Q.real``. + So for example, ``I`` is not nonnegative, nonzero, or + nonpositive. + + Examples + ======== + + >>> from sympy import Q, ask, symbols + >>> x = symbols('x') + >>> ask(Q.real(x), Q.positive(x)) + True + >>> ask(Q.real(0)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Real_number + + """ + name = 'real' + handler = Dispatcher( + "RealHandler", + doc=("Handler for Q.real.\n\n" + "Test that an expression belongs to the field of real numbers.") + ) + + +class ExtendedRealPredicate(Predicate): + r""" + Extended real predicate. + + Explanation + =========== + + ``Q.extended_real(x)`` is true iff ``x`` is a real number or + `\{-\infty, \infty\}`. + + See documentation of ``Q.real`` for more information about related + facts. + + Examples + ======== + + >>> from sympy import ask, Q, oo, I + >>> ask(Q.extended_real(1)) + True + >>> ask(Q.extended_real(I)) + False + >>> ask(Q.extended_real(oo)) + True + + """ + name = 'extended_real' + handler = Dispatcher( + "ExtendedRealHandler", + doc=("Handler for Q.extended_real.\n\n" + "Test that an expression belongs to the field of extended real\n" + "numbers, that is real numbers union {Infinity, -Infinity}.") + ) + + +class HermitianPredicate(Predicate): + """ + Hermitian predicate. + + Explanation + =========== + + ``ask(Q.hermitian(x))`` is true iff ``x`` belongs to the set of + Hermitian operators. + + References + ========== + + .. [1] https://mathworld.wolfram.com/HermitianOperator.html + + """ + # TODO: Add examples + name = 'hermitian' + handler = Dispatcher( + "HermitianHandler", + doc=("Handler for Q.hermitian.\n\n" + "Test that an expression belongs to the field of Hermitian operators.") + ) + + +class ComplexPredicate(Predicate): + """ + Complex number predicate. + + Explanation + =========== + + ``Q.complex(x)`` is true iff ``x`` belongs to the set of complex + numbers. Note that every complex number is finite. + + Examples + ======== + + >>> from sympy import Q, Symbol, ask, I, oo + >>> x = Symbol('x') + >>> ask(Q.complex(0)) + True + >>> ask(Q.complex(2 + 3*I)) + True + >>> ask(Q.complex(oo)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Complex_number + + """ + name = 'complex' + handler = Dispatcher( + "ComplexHandler", + doc=("Handler for Q.complex.\n\n" + "Test that an expression belongs to the field of complex numbers.") + ) + + +class ImaginaryPredicate(Predicate): + """ + Imaginary number predicate. + + Explanation + =========== + + ``Q.imaginary(x)`` is true iff ``x`` can be written as a real + number multiplied by the imaginary unit ``I``. Please note that ``0`` + is not considered to be an imaginary number. + + Examples + ======== + + >>> from sympy import Q, ask, I + >>> ask(Q.imaginary(3*I)) + True + >>> ask(Q.imaginary(2 + 3*I)) + False + >>> ask(Q.imaginary(0)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Imaginary_number + + """ + name = 'imaginary' + handler = Dispatcher( + "ImaginaryHandler", + doc=("Handler for Q.imaginary.\n\n" + "Test that an expression belongs to the field of imaginary numbers,\n" + "that is, numbers in the form x*I, where x is real.") + ) + + +class AntihermitianPredicate(Predicate): + """ + Antihermitian predicate. + + Explanation + =========== + + ``Q.antihermitian(x)`` is true iff ``x`` belongs to the field of + antihermitian operators, i.e., operators in the form ``x*I``, where + ``x`` is Hermitian. + + References + ========== + + .. [1] https://mathworld.wolfram.com/HermitianOperator.html + + """ + # TODO: Add examples + name = 'antihermitian' + handler = Dispatcher( + "AntiHermitianHandler", + doc=("Handler for Q.antihermitian.\n\n" + "Test that an expression belongs to the field of anti-Hermitian\n" + "operators, that is, operators in the form x*I, where x is Hermitian.") + ) + + +class AlgebraicPredicate(Predicate): + r""" + Algebraic number predicate. + + Explanation + =========== + + ``Q.algebraic(x)`` is true iff ``x`` belongs to the set of + algebraic numbers. ``x`` is algebraic if there is some polynomial + in ``p(x)\in \mathbb\{Q\}[x]`` such that ``p(x) = 0``. + + Examples + ======== + + >>> from sympy import ask, Q, sqrt, I, pi + >>> ask(Q.algebraic(sqrt(2))) + True + >>> ask(Q.algebraic(I)) + True + >>> ask(Q.algebraic(pi)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Algebraic_number + + """ + name = 'algebraic' + AlgebraicHandler = Dispatcher( + "AlgebraicHandler", + doc="""Handler for Q.algebraic key.""" + ) + + +class TranscendentalPredicate(Predicate): + """ + Transcedental number predicate. + + Explanation + =========== + + ``Q.transcendental(x)`` is true iff ``x`` belongs to the set of + transcendental numbers. A transcendental number is a real + or complex number that is not algebraic. + + """ + # TODO: Add examples + name = 'transcendental' + handler = Dispatcher( + "Transcendental", + doc="""Handler for Q.transcendental key.""" + ) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/refine.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/refine.py new file mode 100644 index 0000000000000000000000000000000000000000..c36a4e1cdb40f1b59a96f60a3b36182b587920fa --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/refine.py @@ -0,0 +1,405 @@ +from __future__ import annotations +from typing import Callable + +from sympy.core import S, Add, Expr, Basic, Mul, Pow, Rational +from sympy.core.logic import fuzzy_not +from sympy.logic.boolalg import Boolean + +from sympy.assumptions import ask, Q # type: ignore + + +def refine(expr, assumptions=True): + """ + Simplify an expression using assumptions. + + Explanation + =========== + + Unlike :func:`~.simplify` which performs structural simplification + without any assumption, this function transforms the expression into + the form which is only valid under certain assumptions. Note that + ``simplify()`` is generally not done in refining process. + + Refining boolean expression involves reducing it to ``S.true`` or + ``S.false``. Unlike :func:`~.ask`, the expression will not be reduced + if the truth value cannot be determined. + + Examples + ======== + + >>> from sympy import refine, sqrt, Q + >>> from sympy.abc import x + >>> refine(sqrt(x**2), Q.real(x)) + Abs(x) + >>> refine(sqrt(x**2), Q.positive(x)) + x + + >>> refine(Q.real(x), Q.positive(x)) + True + >>> refine(Q.positive(x), Q.real(x)) + Q.positive(x) + + See Also + ======== + + sympy.simplify.simplify.simplify : Structural simplification without assumptions. + sympy.assumptions.ask.ask : Query for boolean expressions using assumptions. + """ + if not isinstance(expr, Basic): + return expr + + if not expr.is_Atom: + args = [refine(arg, assumptions) for arg in expr.args] + # TODO: this will probably not work with Integral or Polynomial + expr = expr.func(*args) + if hasattr(expr, '_eval_refine'): + ref_expr = expr._eval_refine(assumptions) + if ref_expr is not None: + return ref_expr + name = expr.__class__.__name__ + handler = handlers_dict.get(name, None) + if handler is None: + return expr + new_expr = handler(expr, assumptions) + if (new_expr is None) or (expr == new_expr): + return expr + if not isinstance(new_expr, Expr): + return new_expr + return refine(new_expr, assumptions) + + +def refine_abs(expr, assumptions): + """ + Handler for the absolute value. + + Examples + ======== + + >>> from sympy import Q, Abs + >>> from sympy.assumptions.refine import refine_abs + >>> from sympy.abc import x + >>> refine_abs(Abs(x), Q.real(x)) + >>> refine_abs(Abs(x), Q.positive(x)) + x + >>> refine_abs(Abs(x), Q.negative(x)) + -x + + """ + from sympy.functions.elementary.complexes import Abs + arg = expr.args[0] + if ask(Q.real(arg), assumptions) and \ + fuzzy_not(ask(Q.negative(arg), assumptions)): + # if it's nonnegative + return arg + if ask(Q.negative(arg), assumptions): + return -arg + # arg is Mul + if isinstance(arg, Mul): + r = [refine(abs(a), assumptions) for a in arg.args] + non_abs = [] + in_abs = [] + for i in r: + if isinstance(i, Abs): + in_abs.append(i.args[0]) + else: + non_abs.append(i) + return Mul(*non_abs) * Abs(Mul(*in_abs)) + + +def refine_Pow(expr, assumptions): + """ + Handler for instances of Pow. + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.refine import refine_Pow + >>> from sympy.abc import x,y,z + >>> refine_Pow((-1)**x, Q.real(x)) + >>> refine_Pow((-1)**x, Q.even(x)) + 1 + >>> refine_Pow((-1)**x, Q.odd(x)) + -1 + + For powers of -1, even parts of the exponent can be simplified: + + >>> refine_Pow((-1)**(x+y), Q.even(x)) + (-1)**y + >>> refine_Pow((-1)**(x+y+z), Q.odd(x) & Q.odd(z)) + (-1)**y + >>> refine_Pow((-1)**(x+y+2), Q.odd(x)) + (-1)**(y + 1) + >>> refine_Pow((-1)**(x+3), True) + (-1)**(x + 1) + + """ + from sympy.functions.elementary.complexes import Abs + from sympy.functions import sign + if isinstance(expr.base, Abs): + if ask(Q.real(expr.base.args[0]), assumptions) and \ + ask(Q.even(expr.exp), assumptions): + return expr.base.args[0] ** expr.exp + if ask(Q.real(expr.base), assumptions): + if expr.base.is_number: + if ask(Q.even(expr.exp), assumptions): + return abs(expr.base) ** expr.exp + if ask(Q.odd(expr.exp), assumptions): + return sign(expr.base) * abs(expr.base) ** expr.exp + if isinstance(expr.exp, Rational): + if isinstance(expr.base, Pow): + return abs(expr.base.base) ** (expr.base.exp * expr.exp) + + if expr.base is S.NegativeOne: + if expr.exp.is_Add: + + old = expr + + # For powers of (-1) we can remove + # - even terms + # - pairs of odd terms + # - a single odd term + 1 + # - A numerical constant N can be replaced with mod(N,2) + + coeff, terms = expr.exp.as_coeff_add() + terms = set(terms) + even_terms = set() + odd_terms = set() + initial_number_of_terms = len(terms) + + for t in terms: + if ask(Q.even(t), assumptions): + even_terms.add(t) + elif ask(Q.odd(t), assumptions): + odd_terms.add(t) + + terms -= even_terms + if len(odd_terms) % 2: + terms -= odd_terms + new_coeff = (coeff + S.One) % 2 + else: + terms -= odd_terms + new_coeff = coeff % 2 + + if new_coeff != coeff or len(terms) < initial_number_of_terms: + terms.add(new_coeff) + expr = expr.base**(Add(*terms)) + + # Handle (-1)**((-1)**n/2 + m/2) + e2 = 2*expr.exp + if ask(Q.even(e2), assumptions): + if e2.could_extract_minus_sign(): + e2 *= expr.base + if e2.is_Add: + i, p = e2.as_two_terms() + if p.is_Pow and p.base is S.NegativeOne: + if ask(Q.integer(p.exp), assumptions): + i = (i + 1)/2 + if ask(Q.even(i), assumptions): + return expr.base**p.exp + elif ask(Q.odd(i), assumptions): + return expr.base**(p.exp + 1) + else: + return expr.base**(p.exp + i) + + if old != expr: + return expr + + +def refine_atan2(expr, assumptions): + """ + Handler for the atan2 function. + + Examples + ======== + + >>> from sympy import Q, atan2 + >>> from sympy.assumptions.refine import refine_atan2 + >>> from sympy.abc import x, y + >>> refine_atan2(atan2(y,x), Q.real(y) & Q.positive(x)) + atan(y/x) + >>> refine_atan2(atan2(y,x), Q.negative(y) & Q.negative(x)) + atan(y/x) - pi + >>> refine_atan2(atan2(y,x), Q.positive(y) & Q.negative(x)) + atan(y/x) + pi + >>> refine_atan2(atan2(y,x), Q.zero(y) & Q.negative(x)) + pi + >>> refine_atan2(atan2(y,x), Q.positive(y) & Q.zero(x)) + pi/2 + >>> refine_atan2(atan2(y,x), Q.negative(y) & Q.zero(x)) + -pi/2 + >>> refine_atan2(atan2(y,x), Q.zero(y) & Q.zero(x)) + nan + """ + from sympy.functions.elementary.trigonometric import atan + y, x = expr.args + if ask(Q.real(y) & Q.positive(x), assumptions): + return atan(y / x) + elif ask(Q.negative(y) & Q.negative(x), assumptions): + return atan(y / x) - S.Pi + elif ask(Q.positive(y) & Q.negative(x), assumptions): + return atan(y / x) + S.Pi + elif ask(Q.zero(y) & Q.negative(x), assumptions): + return S.Pi + elif ask(Q.positive(y) & Q.zero(x), assumptions): + return S.Pi/2 + elif ask(Q.negative(y) & Q.zero(x), assumptions): + return -S.Pi/2 + elif ask(Q.zero(y) & Q.zero(x), assumptions): + return S.NaN + else: + return expr + + +def refine_re(expr, assumptions): + """ + Handler for real part. + + Examples + ======== + + >>> from sympy.assumptions.refine import refine_re + >>> from sympy import Q, re + >>> from sympy.abc import x + >>> refine_re(re(x), Q.real(x)) + x + >>> refine_re(re(x), Q.imaginary(x)) + 0 + """ + arg = expr.args[0] + if ask(Q.real(arg), assumptions): + return arg + if ask(Q.imaginary(arg), assumptions): + return S.Zero + return _refine_reim(expr, assumptions) + + +def refine_im(expr, assumptions): + """ + Handler for imaginary part. + + Explanation + =========== + + >>> from sympy.assumptions.refine import refine_im + >>> from sympy import Q, im + >>> from sympy.abc import x + >>> refine_im(im(x), Q.real(x)) + 0 + >>> refine_im(im(x), Q.imaginary(x)) + -I*x + """ + arg = expr.args[0] + if ask(Q.real(arg), assumptions): + return S.Zero + if ask(Q.imaginary(arg), assumptions): + return - S.ImaginaryUnit * arg + return _refine_reim(expr, assumptions) + +def refine_arg(expr, assumptions): + """ + Handler for complex argument + + Explanation + =========== + + >>> from sympy.assumptions.refine import refine_arg + >>> from sympy import Q, arg + >>> from sympy.abc import x + >>> refine_arg(arg(x), Q.positive(x)) + 0 + >>> refine_arg(arg(x), Q.negative(x)) + pi + """ + rg = expr.args[0] + if ask(Q.positive(rg), assumptions): + return S.Zero + if ask(Q.negative(rg), assumptions): + return S.Pi + return None + + +def _refine_reim(expr, assumptions): + # Helper function for refine_re & refine_im + expanded = expr.expand(complex = True) + if expanded != expr: + refined = refine(expanded, assumptions) + if refined != expanded: + return refined + # Best to leave the expression as is + return None + + +def refine_sign(expr, assumptions): + """ + Handler for sign. + + Examples + ======== + + >>> from sympy.assumptions.refine import refine_sign + >>> from sympy import Symbol, Q, sign, im + >>> x = Symbol('x', real = True) + >>> expr = sign(x) + >>> refine_sign(expr, Q.positive(x) & Q.nonzero(x)) + 1 + >>> refine_sign(expr, Q.negative(x) & Q.nonzero(x)) + -1 + >>> refine_sign(expr, Q.zero(x)) + 0 + >>> y = Symbol('y', imaginary = True) + >>> expr = sign(y) + >>> refine_sign(expr, Q.positive(im(y))) + I + >>> refine_sign(expr, Q.negative(im(y))) + -I + """ + arg = expr.args[0] + if ask(Q.zero(arg), assumptions): + return S.Zero + if ask(Q.real(arg)): + if ask(Q.positive(arg), assumptions): + return S.One + if ask(Q.negative(arg), assumptions): + return S.NegativeOne + if ask(Q.imaginary(arg)): + arg_re, arg_im = arg.as_real_imag() + if ask(Q.positive(arg_im), assumptions): + return S.ImaginaryUnit + if ask(Q.negative(arg_im), assumptions): + return -S.ImaginaryUnit + return expr + + +def refine_matrixelement(expr, assumptions): + """ + Handler for symmetric part. + + Examples + ======== + + >>> from sympy.assumptions.refine import refine_matrixelement + >>> from sympy import MatrixSymbol, Q + >>> X = MatrixSymbol('X', 3, 3) + >>> refine_matrixelement(X[0, 1], Q.symmetric(X)) + X[0, 1] + >>> refine_matrixelement(X[1, 0], Q.symmetric(X)) + X[0, 1] + """ + from sympy.matrices.expressions.matexpr import MatrixElement + matrix, i, j = expr.args + if ask(Q.symmetric(matrix), assumptions): + if (i - j).could_extract_minus_sign(): + return expr + return MatrixElement(matrix, j, i) + +handlers_dict: dict[str, Callable[[Expr, Boolean], Expr]] = { + 'Abs': refine_abs, + 'Pow': refine_Pow, + 'atan2': refine_atan2, + 're': refine_re, + 'im': refine_im, + 'arg': refine_arg, + 'sign': refine_sign, + 'MatrixElement': refine_matrixelement +} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..04f5ed37893766feec941614691a9177f14e4027 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__init__.py @@ -0,0 +1,13 @@ +""" +A module to implement finitary relations [1] as predicate. + +References +========== + +.. [1] https://en.wikipedia.org/wiki/Finitary_relation + +""" + +__all__ = ['BinaryRelation', 'AppliedBinaryRelation'] + +from .binrel import BinaryRelation, AppliedBinaryRelation diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..fd4a755117e68fc331a125149f7fc291c9818b05 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/binrel.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/binrel.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..ae9ad6888c787d56de31635885047b005c07ca6c Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/binrel.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/equality.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/equality.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..b77eafbb9a65ac48db49f7bd395180b5d618faed Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/__pycache__/equality.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/binrel.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/binrel.py new file mode 100644 index 0000000000000000000000000000000000000000..4b4eba05bcce40f1a05483a30136b6ccd891c42f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/binrel.py @@ -0,0 +1,212 @@ +""" +General binary relations. +""" +from typing import Optional + +from sympy.core.singleton import S +from sympy.assumptions import AppliedPredicate, ask, Predicate, Q # type: ignore +from sympy.core.kind import BooleanKind +from sympy.core.relational import Eq, Ne, Gt, Lt, Ge, Le +from sympy.logic.boolalg import conjuncts, Not + +__all__ = ["BinaryRelation", "AppliedBinaryRelation"] + + +class BinaryRelation(Predicate): + """ + Base class for all binary relational predicates. + + Explanation + =========== + + Binary relation takes two arguments and returns ``AppliedBinaryRelation`` + instance. To evaluate it to boolean value, use :obj:`~.ask()` or + :obj:`~.refine()` function. + + You can add support for new types by registering the handler to dispatcher. + See :obj:`~.Predicate()` for more information about predicate dispatching. + + Examples + ======== + + Applying and evaluating to boolean value: + + >>> from sympy import Q, ask, sin, cos + >>> from sympy.abc import x + >>> Q.eq(sin(x)**2+cos(x)**2, 1) + Q.eq(sin(x)**2 + cos(x)**2, 1) + >>> ask(_) + True + + You can define a new binary relation by subclassing and dispatching. + Here, we define a relation $R$ such that $x R y$ returns true if + $x = y + 1$. + + >>> from sympy import ask, Number, Q + >>> from sympy.assumptions import BinaryRelation + >>> class MyRel(BinaryRelation): + ... name = "R" + ... is_reflexive = False + >>> Q.R = MyRel() + >>> @Q.R.register(Number, Number) + ... def _(n1, n2, assumptions): + ... return ask(Q.zero(n1 - n2 - 1), assumptions) + >>> Q.R(2, 1) + Q.R(2, 1) + + Now, we can use ``ask()`` to evaluate it to boolean value. + + >>> ask(Q.R(2, 1)) + True + >>> ask(Q.R(1, 2)) + False + + ``Q.R`` returns ``False`` with minimum cost if two arguments have same + structure because it is antireflexive relation [1] by + ``is_reflexive = False``. + + >>> ask(Q.R(x, x)) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Reflexive_relation + """ + + is_reflexive: Optional[bool] = None + is_symmetric: Optional[bool] = None + + def __call__(self, *args): + if not len(args) == 2: + raise ValueError("Binary relation takes two arguments, but got %s." % len(args)) + return AppliedBinaryRelation(self, *args) + + @property + def reversed(self): + if self.is_symmetric: + return self + return None + + @property + def negated(self): + return None + + def _compare_reflexive(self, lhs, rhs): + # quick exit for structurally same arguments + # do not check != here because it cannot catch the + # equivalent arguments with different structures. + + # reflexivity does not hold to NaN + if lhs is S.NaN or rhs is S.NaN: + return None + + reflexive = self.is_reflexive + if reflexive is None: + pass + elif reflexive and (lhs == rhs): + return True + elif not reflexive and (lhs == rhs): + return False + return None + + def eval(self, args, assumptions=True): + # quick exit for structurally same arguments + ret = self._compare_reflexive(*args) + if ret is not None: + return ret + + # don't perform simplify on args here. (done by AppliedBinaryRelation._eval_ask) + # evaluate by multipledispatch + lhs, rhs = args + ret = self.handler(lhs, rhs, assumptions=assumptions) + if ret is not None: + return ret + + # check reversed order if the relation is reflexive + if self.is_reflexive: + types = (type(lhs), type(rhs)) + if self.handler.dispatch(*types) is not self.handler.dispatch(*reversed(types)): + ret = self.handler(rhs, lhs, assumptions=assumptions) + + return ret + + +class AppliedBinaryRelation(AppliedPredicate): + """ + The class of expressions resulting from applying ``BinaryRelation`` + to the arguments. + + """ + + @property + def lhs(self): + """The left-hand side of the relation.""" + return self.arguments[0] + + @property + def rhs(self): + """The right-hand side of the relation.""" + return self.arguments[1] + + @property + def reversed(self): + """ + Try to return the relationship with sides reversed. + """ + revfunc = self.function.reversed + if revfunc is None: + return self + return revfunc(self.rhs, self.lhs) + + @property + def reversedsign(self): + """ + Try to return the relationship with signs reversed. + """ + revfunc = self.function.reversed + if revfunc is None: + return self + if not any(side.kind is BooleanKind for side in self.arguments): + return revfunc(-self.lhs, -self.rhs) + return self + + @property + def negated(self): + neg_rel = self.function.negated + if neg_rel is None: + return Not(self, evaluate=False) + return neg_rel(*self.arguments) + + def _eval_ask(self, assumptions): + conj_assumps = set() + binrelpreds = {Eq: Q.eq, Ne: Q.ne, Gt: Q.gt, Lt: Q.lt, Ge: Q.ge, Le: Q.le} + for a in conjuncts(assumptions): + if a.func in binrelpreds: + conj_assumps.add(binrelpreds[type(a)](*a.args)) + else: + conj_assumps.add(a) + + # After CNF in assumptions module is modified to take polyadic + # predicate, this will be removed + if any(rel in conj_assumps for rel in (self, self.reversed)): + return True + neg_rels = (self.negated, self.reversed.negated, Not(self, evaluate=False), + Not(self.reversed, evaluate=False)) + if any(rel in conj_assumps for rel in neg_rels): + return False + + # evaluation using multipledispatching + ret = self.function.eval(self.arguments, assumptions) + if ret is not None: + return ret + + # simplify the args and try again + args = tuple(a.simplify() for a in self.arguments) + return self.function.eval(args, assumptions) + + def __bool__(self): + ret = ask(self) + if ret is None: + raise TypeError("Cannot determine truth value of %s" % self) + return ret diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/equality.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/equality.py new file mode 100644 index 0000000000000000000000000000000000000000..d467cea2da706de2cbbc9875f93c7f8e324a9088 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/relation/equality.py @@ -0,0 +1,302 @@ +""" +Module for mathematical equality [1] and inequalities [2]. + +The purpose of this module is to provide the instances which represent the +binary predicates in order to combine the relationals into logical inference +system. Objects such as ``Q.eq``, ``Q.lt`` should remain internal to +assumptions module, and user must use the classes such as :obj:`~.Eq()`, +:obj:`~.Lt()` instead to construct the relational expressions. + +References +========== + +.. [1] https://en.wikipedia.org/wiki/Equality_(mathematics) +.. [2] https://en.wikipedia.org/wiki/Inequality_(mathematics) +""" +from sympy.assumptions import Q +from sympy.core.relational import is_eq, is_neq, is_gt, is_ge, is_lt, is_le + +from .binrel import BinaryRelation + +__all__ = ['EqualityPredicate', 'UnequalityPredicate', 'StrictGreaterThanPredicate', + 'GreaterThanPredicate', 'StrictLessThanPredicate', 'LessThanPredicate'] + + +class EqualityPredicate(BinaryRelation): + """ + Binary predicate for $=$. + + The purpose of this class is to provide the instance which represent + the equality predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Eq()` instead to construct the equality expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_eq` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.eq(0, 0) + Q.eq(0, 0) + >>> ask(_) + True + + See Also + ======== + + sympy.core.relational.Eq + + """ + is_reflexive = True + is_symmetric = True + + name = 'eq' + handler = None # Do not allow dispatching by this predicate + + @property + def negated(self): + return Q.ne + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_eq is None + assumptions = None + return is_eq(*args, assumptions) + + +class UnequalityPredicate(BinaryRelation): + r""" + Binary predicate for $\neq$. + + The purpose of this class is to provide the instance which represent + the inequation predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Ne()` instead to construct the inequation expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_neq` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.ne(0, 0) + Q.ne(0, 0) + >>> ask(_) + False + + See Also + ======== + + sympy.core.relational.Ne + + """ + is_reflexive = False + is_symmetric = True + + name = 'ne' + handler = None + + @property + def negated(self): + return Q.eq + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_neq is None + assumptions = None + return is_neq(*args, assumptions) + + +class StrictGreaterThanPredicate(BinaryRelation): + """ + Binary predicate for $>$. + + The purpose of this class is to provide the instance which represent + the ">" predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Gt()` instead to construct the equality expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_gt` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.gt(0, 0) + Q.gt(0, 0) + >>> ask(_) + False + + See Also + ======== + + sympy.core.relational.Gt + + """ + is_reflexive = False + is_symmetric = False + + name = 'gt' + handler = None + + @property + def reversed(self): + return Q.lt + + @property + def negated(self): + return Q.le + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_gt is None + assumptions = None + return is_gt(*args, assumptions) + + +class GreaterThanPredicate(BinaryRelation): + """ + Binary predicate for $>=$. + + The purpose of this class is to provide the instance which represent + the ">=" predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Ge()` instead to construct the equality expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_ge` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.ge(0, 0) + Q.ge(0, 0) + >>> ask(_) + True + + See Also + ======== + + sympy.core.relational.Ge + + """ + is_reflexive = True + is_symmetric = False + + name = 'ge' + handler = None + + @property + def reversed(self): + return Q.le + + @property + def negated(self): + return Q.lt + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_ge is None + assumptions = None + return is_ge(*args, assumptions) + + +class StrictLessThanPredicate(BinaryRelation): + """ + Binary predicate for $<$. + + The purpose of this class is to provide the instance which represent + the "<" predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Lt()` instead to construct the equality expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_lt` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.lt(0, 0) + Q.lt(0, 0) + >>> ask(_) + False + + See Also + ======== + + sympy.core.relational.Lt + + """ + is_reflexive = False + is_symmetric = False + + name = 'lt' + handler = None + + @property + def reversed(self): + return Q.gt + + @property + def negated(self): + return Q.ge + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_lt is None + assumptions = None + return is_lt(*args, assumptions) + + +class LessThanPredicate(BinaryRelation): + """ + Binary predicate for $<=$. + + The purpose of this class is to provide the instance which represent + the "<=" predicate in order to allow the logical inference. + This class must remain internal to assumptions module and user must + use :obj:`~.Le()` instead to construct the equality expression. + + Evaluating this predicate to ``True`` or ``False`` is done by + :func:`~.core.relational.is_le` + + Examples + ======== + + >>> from sympy import ask, Q + >>> Q.le(0, 0) + Q.le(0, 0) + >>> ask(_) + True + + See Also + ======== + + sympy.core.relational.Le + + """ + is_reflexive = True + is_symmetric = False + + name = 'le' + handler = None + + @property + def reversed(self): + return Q.ge + + @property + def negated(self): + return Q.gt + + def eval(self, args, assumptions=True): + if assumptions == True: + # default assumptions for is_le is None + assumptions = None + return is_le(*args, assumptions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/satask.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/satask.py new file mode 100644 index 0000000000000000000000000000000000000000..ffc13f6d3bc3fb7f573c8d5d0564b780440c1a8c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/satask.py @@ -0,0 +1,369 @@ +""" +Module to evaluate the proposition with assumptions using SAT algorithm. +""" + +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.kind import NumberKind, UndefinedKind +from sympy.assumptions.ask_generated import get_all_known_matrix_facts, get_all_known_number_facts +from sympy.assumptions.assume import global_assumptions, AppliedPredicate +from sympy.assumptions.sathandlers import class_fact_registry +from sympy.core import oo +from sympy.logic.inference import satisfiable +from sympy.assumptions.cnf import CNF, EncodedCNF +from sympy.matrices.kind import MatrixKind + + +def satask(proposition, assumptions=True, context=global_assumptions, + use_known_facts=True, iterations=oo): + """ + Function to evaluate the proposition with assumptions using SAT algorithm. + + This function extracts every fact relevant to the expressions composing + proposition and assumptions. For example, if a predicate containing + ``Abs(x)`` is proposed, then ``Q.zero(Abs(x)) | Q.positive(Abs(x))`` + will be found and passed to SAT solver because ``Q.nonnegative`` is + registered as a fact for ``Abs``. + + Proposition is evaluated to ``True`` or ``False`` if the truth value can be + determined. If not, ``None`` is returned. + + Parameters + ========== + + proposition : Any boolean expression. + Proposition which will be evaluated to boolean value. + + assumptions : Any boolean expression, optional. + Local assumptions to evaluate the *proposition*. + + context : AssumptionsContext, optional. + Default assumptions to evaluate the *proposition*. By default, + this is ``sympy.assumptions.global_assumptions`` variable. + + use_known_facts : bool, optional. + If ``True``, facts from ``sympy.assumptions.ask_generated`` + module are passed to SAT solver as well. + + iterations : int, optional. + Number of times that relevant facts are recursively extracted. + Default is infinite times until no new fact is found. + + Returns + ======= + + ``True``, ``False``, or ``None`` + + Examples + ======== + + >>> from sympy import Abs, Q + >>> from sympy.assumptions.satask import satask + >>> from sympy.abc import x + >>> satask(Q.zero(Abs(x)), Q.zero(x)) + True + + """ + props = CNF.from_prop(proposition) + _props = CNF.from_prop(~proposition) + + assumptions = CNF.from_prop(assumptions) + + context_cnf = CNF() + if context: + context_cnf = context_cnf.extend(context) + + sat = get_all_relevant_facts(props, assumptions, context_cnf, + use_known_facts=use_known_facts, iterations=iterations) + sat.add_from_cnf(assumptions) + if context: + sat.add_from_cnf(context_cnf) + + return check_satisfiability(props, _props, sat) + + +def check_satisfiability(prop, _prop, factbase): + sat_true = factbase.copy() + sat_false = factbase.copy() + sat_true.add_from_cnf(prop) + sat_false.add_from_cnf(_prop) + can_be_true = satisfiable(sat_true) + can_be_false = satisfiable(sat_false) + + if can_be_true and can_be_false: + return None + + if can_be_true and not can_be_false: + return True + + if not can_be_true and can_be_false: + return False + + if not can_be_true and not can_be_false: + # TODO: Run additional checks to see which combination of the + # assumptions, global_assumptions, and relevant_facts are + # inconsistent. + raise ValueError("Inconsistent assumptions") + + +def extract_predargs(proposition, assumptions=None, context=None): + """ + Extract every expression in the argument of predicates from *proposition*, + *assumptions* and *context*. + + Parameters + ========== + + proposition : sympy.assumptions.cnf.CNF + + assumptions : sympy.assumptions.cnf.CNF, optional. + + context : sympy.assumptions.cnf.CNF, optional. + CNF generated from assumptions context. + + Examples + ======== + + >>> from sympy import Q, Abs + >>> from sympy.assumptions.cnf import CNF + >>> from sympy.assumptions.satask import extract_predargs + >>> from sympy.abc import x, y + >>> props = CNF.from_prop(Q.zero(Abs(x*y))) + >>> assump = CNF.from_prop(Q.zero(x) & Q.zero(y)) + >>> extract_predargs(props, assump) + {x, y, Abs(x*y)} + + """ + req_keys = find_symbols(proposition) + keys = proposition.all_predicates() + # XXX: We need this since True/False are not Basic + lkeys = set() + if assumptions: + lkeys |= assumptions.all_predicates() + if context: + lkeys |= context.all_predicates() + + lkeys = lkeys - {S.true, S.false} + tmp_keys = None + while tmp_keys != set(): + tmp = set() + for l in lkeys: + syms = find_symbols(l) + if (syms & req_keys) != set(): + tmp |= syms + tmp_keys = tmp - req_keys + req_keys |= tmp_keys + keys |= {l for l in lkeys if find_symbols(l) & req_keys != set()} + + exprs = set() + for key in keys: + if isinstance(key, AppliedPredicate): + exprs |= set(key.arguments) + else: + exprs.add(key) + return exprs + +def find_symbols(pred): + """ + Find every :obj:`~.Symbol` in *pred*. + + Parameters + ========== + + pred : sympy.assumptions.cnf.CNF, or any Expr. + + """ + if isinstance(pred, CNF): + symbols = set() + for a in pred.all_predicates(): + symbols |= find_symbols(a) + return symbols + return pred.atoms(Symbol) + + +def get_relevant_clsfacts(exprs, relevant_facts=None): + """ + Extract relevant facts from the items in *exprs*. Facts are defined in + ``assumptions.sathandlers`` module. + + This function is recursively called by ``get_all_relevant_facts()``. + + Parameters + ========== + + exprs : set + Expressions whose relevant facts are searched. + + relevant_facts : sympy.assumptions.cnf.CNF, optional. + Pre-discovered relevant facts. + + Returns + ======= + + exprs : set + Candidates for next relevant fact searching. + + relevant_facts : sympy.assumptions.cnf.CNF + Updated relevant facts. + + Examples + ======== + + Here, we will see how facts relevant to ``Abs(x*y)`` are recursively + extracted. On the first run, set containing the expression is passed + without pre-discovered relevant facts. The result is a set containing + candidates for next run, and ``CNF()`` instance containing facts + which are relevant to ``Abs`` and its argument. + + >>> from sympy import Abs + >>> from sympy.assumptions.satask import get_relevant_clsfacts + >>> from sympy.abc import x, y + >>> exprs = {Abs(x*y)} + >>> exprs, facts = get_relevant_clsfacts(exprs) + >>> exprs + {x*y} + >>> facts.clauses #doctest: +SKIP + {frozenset({Literal(Q.odd(Abs(x*y)), False), Literal(Q.odd(x*y), True)}), + frozenset({Literal(Q.zero(Abs(x*y)), False), Literal(Q.zero(x*y), True)}), + frozenset({Literal(Q.even(Abs(x*y)), False), Literal(Q.even(x*y), True)}), + frozenset({Literal(Q.zero(Abs(x*y)), True), Literal(Q.zero(x*y), False)}), + frozenset({Literal(Q.even(Abs(x*y)), False), + Literal(Q.odd(Abs(x*y)), False), + Literal(Q.odd(x*y), True)}), + frozenset({Literal(Q.even(Abs(x*y)), False), + Literal(Q.even(x*y), True), + Literal(Q.odd(Abs(x*y)), False)}), + frozenset({Literal(Q.positive(Abs(x*y)), False), + Literal(Q.zero(Abs(x*y)), False)})} + + We pass the first run's results to the second run, and get the expressions + for next run and updated facts. + + >>> exprs, facts = get_relevant_clsfacts(exprs, relevant_facts=facts) + >>> exprs + {x, y} + + On final run, no more candidate is returned thus we know that all + relevant facts are successfully retrieved. + + >>> exprs, facts = get_relevant_clsfacts(exprs, relevant_facts=facts) + >>> exprs + set() + + """ + if not relevant_facts: + relevant_facts = CNF() + + newexprs = set() + for expr in exprs: + for fact in class_fact_registry(expr): + newfact = CNF.to_CNF(fact) + relevant_facts = relevant_facts._and(newfact) + for key in newfact.all_predicates(): + if isinstance(key, AppliedPredicate): + newexprs |= set(key.arguments) + + return newexprs - exprs, relevant_facts + + +def get_all_relevant_facts(proposition, assumptions, context, + use_known_facts=True, iterations=oo): + """ + Extract all relevant facts from *proposition* and *assumptions*. + + This function extracts the facts by recursively calling + ``get_relevant_clsfacts()``. Extracted facts are converted to + ``EncodedCNF`` and returned. + + Parameters + ========== + + proposition : sympy.assumptions.cnf.CNF + CNF generated from proposition expression. + + assumptions : sympy.assumptions.cnf.CNF + CNF generated from assumption expression. + + context : sympy.assumptions.cnf.CNF + CNF generated from assumptions context. + + use_known_facts : bool, optional. + If ``True``, facts from ``sympy.assumptions.ask_generated`` + module are encoded as well. + + iterations : int, optional. + Number of times that relevant facts are recursively extracted. + Default is infinite times until no new fact is found. + + Returns + ======= + + sympy.assumptions.cnf.EncodedCNF + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.cnf import CNF + >>> from sympy.assumptions.satask import get_all_relevant_facts + >>> from sympy.abc import x, y + >>> props = CNF.from_prop(Q.nonzero(x*y)) + >>> assump = CNF.from_prop(Q.nonzero(x)) + >>> context = CNF.from_prop(Q.nonzero(y)) + >>> get_all_relevant_facts(props, assump, context) #doctest: +SKIP + + + """ + # The relevant facts might introduce new keys, e.g., Q.zero(x*y) will + # introduce the keys Q.zero(x) and Q.zero(y), so we need to run it until + # we stop getting new things. Hopefully this strategy won't lead to an + # infinite loop in the future. + i = 0 + relevant_facts = CNF() + all_exprs = set() + while True: + if i == 0: + exprs = extract_predargs(proposition, assumptions, context) + all_exprs |= exprs + exprs, relevant_facts = get_relevant_clsfacts(exprs, relevant_facts) + i += 1 + if i >= iterations: + break + if not exprs: + break + + if use_known_facts: + known_facts_CNF = CNF() + + if any(expr.kind == MatrixKind(NumberKind) for expr in all_exprs): + known_facts_CNF.add_clauses(get_all_known_matrix_facts()) + # check for undefinedKind since kind system isn't fully implemented + if any(((expr.kind == NumberKind) or (expr.kind == UndefinedKind)) for expr in all_exprs): + known_facts_CNF.add_clauses(get_all_known_number_facts()) + + kf_encoded = EncodedCNF() + kf_encoded.from_cnf(known_facts_CNF) + + def translate_literal(lit, delta): + if lit > 0: + return lit + delta + else: + return lit - delta + + def translate_data(data, delta): + return [{translate_literal(i, delta) for i in clause} for clause in data] + data = [] + symbols = [] + n_lit = len(kf_encoded.symbols) + for i, expr in enumerate(all_exprs): + symbols += [pred(expr) for pred in kf_encoded.symbols] + data += translate_data(kf_encoded.data, i * n_lit) + + encoding = dict(list(zip(symbols, range(1, len(symbols)+1)))) + ctx = EncodedCNF(data, encoding) + else: + ctx = EncodedCNF() + + ctx.add_from_cnf(relevant_facts) + + return ctx diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/sathandlers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/sathandlers.py new file mode 100644 index 0000000000000000000000000000000000000000..a11199eb0e547187ab280c18196c0259c178e004 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/sathandlers.py @@ -0,0 +1,322 @@ +from collections import defaultdict + +from sympy.assumptions.ask import Q +from sympy.core import (Add, Mul, Pow, Number, NumberSymbol, Symbol) +from sympy.core.numbers import ImaginaryUnit +from sympy.functions.elementary.complexes import Abs +from sympy.logic.boolalg import (Equivalent, And, Or, Implies) +from sympy.matrices.expressions import MatMul + +# APIs here may be subject to change + + +### Helper functions ### + +def allargs(symbol, fact, expr): + """ + Apply all arguments of the expression to the fact structure. + + Parameters + ========== + + symbol : Symbol + A placeholder symbol. + + fact : Boolean + Resulting ``Boolean`` expression. + + expr : Expr + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.sathandlers import allargs + >>> from sympy.abc import x, y + >>> allargs(x, Q.negative(x) | Q.positive(x), x*y) + (Q.negative(x) | Q.positive(x)) & (Q.negative(y) | Q.positive(y)) + + """ + return And(*[fact.subs(symbol, arg) for arg in expr.args]) + + +def anyarg(symbol, fact, expr): + """ + Apply any argument of the expression to the fact structure. + + Parameters + ========== + + symbol : Symbol + A placeholder symbol. + + fact : Boolean + Resulting ``Boolean`` expression. + + expr : Expr + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.sathandlers import anyarg + >>> from sympy.abc import x, y + >>> anyarg(x, Q.negative(x) & Q.positive(x), x*y) + (Q.negative(x) & Q.positive(x)) | (Q.negative(y) & Q.positive(y)) + + """ + return Or(*[fact.subs(symbol, arg) for arg in expr.args]) + + +def exactlyonearg(symbol, fact, expr): + """ + Apply exactly one argument of the expression to the fact structure. + + Parameters + ========== + + symbol : Symbol + A placeholder symbol. + + fact : Boolean + Resulting ``Boolean`` expression. + + expr : Expr + + Examples + ======== + + >>> from sympy import Q + >>> from sympy.assumptions.sathandlers import exactlyonearg + >>> from sympy.abc import x, y + >>> exactlyonearg(x, Q.positive(x), x*y) + (Q.positive(x) & ~Q.positive(y)) | (Q.positive(y) & ~Q.positive(x)) + + """ + pred_args = [fact.subs(symbol, arg) for arg in expr.args] + res = Or(*[And(pred_args[i], *[~lit for lit in pred_args[:i] + + pred_args[i+1:]]) for i in range(len(pred_args))]) + return res + + +### Fact registry ### + +class ClassFactRegistry: + """ + Register handlers against classes. + + Explanation + =========== + + ``register`` method registers the handler function for a class. Here, + handler function should return a single fact. ``multiregister`` method + registers the handler function for multiple classes. Here, handler function + should return a container of multiple facts. + + ``registry(expr)`` returns a set of facts for *expr*. + + Examples + ======== + + Here, we register the facts for ``Abs``. + + >>> from sympy import Abs, Equivalent, Q + >>> from sympy.assumptions.sathandlers import ClassFactRegistry + >>> reg = ClassFactRegistry() + >>> @reg.register(Abs) + ... def f1(expr): + ... return Q.nonnegative(expr) + >>> @reg.register(Abs) + ... def f2(expr): + ... arg = expr.args[0] + ... return Equivalent(~Q.zero(arg), ~Q.zero(expr)) + + Calling the registry with expression returns the defined facts for the + expression. + + >>> from sympy.abc import x + >>> reg(Abs(x)) + {Q.nonnegative(Abs(x)), Equivalent(~Q.zero(x), ~Q.zero(Abs(x)))} + + Multiple facts can be registered at once by ``multiregister`` method. + + >>> reg2 = ClassFactRegistry() + >>> @reg2.multiregister(Abs) + ... def _(expr): + ... arg = expr.args[0] + ... return [Q.even(arg) >> Q.even(expr), Q.odd(arg) >> Q.odd(expr)] + >>> reg2(Abs(x)) + {Implies(Q.even(x), Q.even(Abs(x))), Implies(Q.odd(x), Q.odd(Abs(x)))} + + """ + def __init__(self): + self.singlefacts = defaultdict(frozenset) + self.multifacts = defaultdict(frozenset) + + def register(self, cls): + def _(func): + self.singlefacts[cls] |= {func} + return func + return _ + + def multiregister(self, *classes): + def _(func): + for cls in classes: + self.multifacts[cls] |= {func} + return func + return _ + + def __getitem__(self, key): + ret1 = self.singlefacts[key] + for k in self.singlefacts: + if issubclass(key, k): + ret1 |= self.singlefacts[k] + + ret2 = self.multifacts[key] + for k in self.multifacts: + if issubclass(key, k): + ret2 |= self.multifacts[k] + + return ret1, ret2 + + def __call__(self, expr): + ret = set() + + handlers1, handlers2 = self[type(expr)] + + ret.update(h(expr) for h in handlers1) + for h in handlers2: + ret.update(h(expr)) + return ret + +class_fact_registry = ClassFactRegistry() + + + +### Class fact registration ### + +x = Symbol('x') + +## Abs ## + +@class_fact_registry.multiregister(Abs) +def _(expr): + arg = expr.args[0] + return [Q.nonnegative(expr), + Equivalent(~Q.zero(arg), ~Q.zero(expr)), + Q.even(arg) >> Q.even(expr), + Q.odd(arg) >> Q.odd(expr), + Q.integer(arg) >> Q.integer(expr), + ] + + +### Add ## + +@class_fact_registry.multiregister(Add) +def _(expr): + return [allargs(x, Q.positive(x), expr) >> Q.positive(expr), + allargs(x, Q.negative(x), expr) >> Q.negative(expr), + allargs(x, Q.real(x), expr) >> Q.real(expr), + allargs(x, Q.rational(x), expr) >> Q.rational(expr), + allargs(x, Q.integer(x), expr) >> Q.integer(expr), + exactlyonearg(x, ~Q.integer(x), expr) >> ~Q.integer(expr), + ] + +@class_fact_registry.register(Add) +def _(expr): + allargs_real = allargs(x, Q.real(x), expr) + onearg_irrational = exactlyonearg(x, Q.irrational(x), expr) + return Implies(allargs_real, Implies(onearg_irrational, Q.irrational(expr))) + + +### Mul ### + +@class_fact_registry.multiregister(Mul) +def _(expr): + return [Equivalent(Q.zero(expr), anyarg(x, Q.zero(x), expr)), + allargs(x, Q.positive(x), expr) >> Q.positive(expr), + allargs(x, Q.real(x), expr) >> Q.real(expr), + allargs(x, Q.rational(x), expr) >> Q.rational(expr), + allargs(x, Q.integer(x), expr) >> Q.integer(expr), + exactlyonearg(x, ~Q.rational(x), expr) >> ~Q.integer(expr), + allargs(x, Q.commutative(x), expr) >> Q.commutative(expr), + ] + +@class_fact_registry.register(Mul) +def _(expr): + # Implicitly assumes Mul has more than one arg + # Would be allargs(x, Q.prime(x) | Q.composite(x)) except 1 is composite + # More advanced prime assumptions will require inequalities, as 1 provides + # a corner case. + allargs_prime = allargs(x, Q.prime(x), expr) + return Implies(allargs_prime, ~Q.prime(expr)) + +@class_fact_registry.register(Mul) +def _(expr): + # General Case: Odd number of imaginary args implies mul is imaginary(To be implemented) + allargs_imag_or_real = allargs(x, Q.imaginary(x) | Q.real(x), expr) + onearg_imaginary = exactlyonearg(x, Q.imaginary(x), expr) + return Implies(allargs_imag_or_real, Implies(onearg_imaginary, Q.imaginary(expr))) + +@class_fact_registry.register(Mul) +def _(expr): + allargs_real = allargs(x, Q.real(x), expr) + onearg_irrational = exactlyonearg(x, Q.irrational(x), expr) + return Implies(allargs_real, Implies(onearg_irrational, Q.irrational(expr))) + +@class_fact_registry.register(Mul) +def _(expr): + # Including the integer qualification means we don't need to add any facts + # for odd, since the assumptions already know that every integer is + # exactly one of even or odd. + allargs_integer = allargs(x, Q.integer(x), expr) + anyarg_even = anyarg(x, Q.even(x), expr) + return Implies(allargs_integer, Equivalent(anyarg_even, Q.even(expr))) + + +### MatMul ### + +@class_fact_registry.register(MatMul) +def _(expr): + allargs_square = allargs(x, Q.square(x), expr) + allargs_invertible = allargs(x, Q.invertible(x), expr) + return Implies(allargs_square, Equivalent(Q.invertible(expr), allargs_invertible)) + + +### Pow ### + +@class_fact_registry.multiregister(Pow) +def _(expr): + base, exp = expr.base, expr.exp + return [ + (Q.real(base) & Q.even(exp) & Q.nonnegative(exp)) >> Q.nonnegative(expr), + (Q.nonnegative(base) & Q.odd(exp) & Q.nonnegative(exp)) >> Q.nonnegative(expr), + (Q.nonpositive(base) & Q.odd(exp) & Q.nonnegative(exp)) >> Q.nonpositive(expr), + Equivalent(Q.zero(expr), Q.zero(base) & Q.positive(exp)) + ] + + +### Numbers ### + +_old_assump_getters = { + Q.positive: lambda o: o.is_positive, + Q.zero: lambda o: o.is_zero, + Q.negative: lambda o: o.is_negative, + Q.rational: lambda o: o.is_rational, + Q.irrational: lambda o: o.is_irrational, + Q.even: lambda o: o.is_even, + Q.odd: lambda o: o.is_odd, + Q.imaginary: lambda o: o.is_imaginary, + Q.prime: lambda o: o.is_prime, + Q.composite: lambda o: o.is_composite, +} + +@class_fact_registry.multiregister(Number, NumberSymbol, ImaginaryUnit) +def _(expr): + ret = [] + for p, getter in _old_assump_getters.items(): + pred = p(expr) + prop = getter(expr) + if prop is not None: + ret.append(Equivalent(pred, prop)) + return ret diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_assumptions_2.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_assumptions_2.py new file mode 100644 index 0000000000000000000000000000000000000000..493fe4a7ed70301754ad2cfe181c5acf30433768 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_assumptions_2.py @@ -0,0 +1,35 @@ +""" +rename this to test_assumptions.py when the old assumptions system is deleted +""" +from sympy.abc import x, y +from sympy.assumptions.assume import global_assumptions +from sympy.assumptions.ask import Q +from sympy.printing import pretty + + +def test_equal(): + """Test for equality""" + assert Q.positive(x) == Q.positive(x) + assert Q.positive(x) != ~Q.positive(x) + assert ~Q.positive(x) == ~Q.positive(x) + + +def test_pretty(): + assert pretty(Q.positive(x)) == "Q.positive(x)" + assert pretty( + {Q.positive, Q.integer}) == "{Q.integer, Q.positive}" + + +def test_global(): + """Test for global assumptions""" + global_assumptions.add(x > 0) + assert (x > 0) in global_assumptions + global_assumptions.remove(x > 0) + assert not (x > 0) in global_assumptions + # same with multiple of assumptions + global_assumptions.add(x > 0, y > 0) + assert (x > 0) in global_assumptions + assert (y > 0) in global_assumptions + global_assumptions.clear() + assert not (x > 0) in global_assumptions + assert not (y > 0) in global_assumptions diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_context.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_context.py new file mode 100644 index 0000000000000000000000000000000000000000..be162f1c69492218ff90ea69492925d7779567a4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_context.py @@ -0,0 +1,39 @@ +from sympy.assumptions import ask, Q +from sympy.assumptions.assume import assuming, global_assumptions +from sympy.abc import x, y + +def test_assuming(): + with assuming(Q.integer(x)): + assert ask(Q.integer(x)) + assert not ask(Q.integer(x)) + +def test_assuming_nested(): + assert not ask(Q.integer(x)) + assert not ask(Q.integer(y)) + with assuming(Q.integer(x)): + assert ask(Q.integer(x)) + assert not ask(Q.integer(y)) + with assuming(Q.integer(y)): + assert ask(Q.integer(x)) + assert ask(Q.integer(y)) + assert ask(Q.integer(x)) + assert not ask(Q.integer(y)) + assert not ask(Q.integer(x)) + assert not ask(Q.integer(y)) + +def test_finally(): + try: + with assuming(Q.integer(x)): + 1/0 + except ZeroDivisionError: + pass + assert not ask(Q.integer(x)) + +def test_remove_safe(): + global_assumptions.add(Q.integer(x)) + with assuming(): + assert ask(Q.integer(x)) + global_assumptions.remove(Q.integer(x)) + assert not ask(Q.integer(x)) + assert ask(Q.integer(x)) + global_assumptions.clear() # for the benefit of other tests diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_matrices.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..8bfa990f080eebe4d6dd5bfdd733ce1a19adf329 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_matrices.py @@ -0,0 +1,283 @@ +from sympy.assumptions.ask import (Q, ask) +from sympy.core.symbol import Symbol +from sympy.matrices.expressions.diagonal import (DiagMatrix, DiagonalMatrix) +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions import (MatrixSymbol, Identity, ZeroMatrix, + OneMatrix, Trace, MatrixSlice, Determinant, BlockMatrix, BlockDiagMatrix) +from sympy.matrices.expressions.factorizations import LofLU +from sympy.testing.pytest import XFAIL + +X = MatrixSymbol('X', 2, 2) +Y = MatrixSymbol('Y', 2, 3) +Z = MatrixSymbol('Z', 2, 2) +A1x1 = MatrixSymbol('A1x1', 1, 1) +B1x1 = MatrixSymbol('B1x1', 1, 1) +C0x0 = MatrixSymbol('C0x0', 0, 0) +V1 = MatrixSymbol('V1', 2, 1) +V2 = MatrixSymbol('V2', 2, 1) + +def test_square(): + assert ask(Q.square(X)) + assert not ask(Q.square(Y)) + assert ask(Q.square(Y*Y.T)) + +def test_invertible(): + assert ask(Q.invertible(X), Q.invertible(X)) + assert ask(Q.invertible(Y)) is False + assert ask(Q.invertible(X*Y), Q.invertible(X)) is False + assert ask(Q.invertible(X*Z), Q.invertible(X)) is None + assert ask(Q.invertible(X*Z), Q.invertible(X) & Q.invertible(Z)) is True + assert ask(Q.invertible(X.T)) is None + assert ask(Q.invertible(X.T), Q.invertible(X)) is True + assert ask(Q.invertible(X.I)) is True + assert ask(Q.invertible(Identity(3))) is True + assert ask(Q.invertible(ZeroMatrix(3, 3))) is False + assert ask(Q.invertible(OneMatrix(1, 1))) is True + assert ask(Q.invertible(OneMatrix(3, 3))) is False + assert ask(Q.invertible(X), Q.fullrank(X) & Q.square(X)) + +def test_singular(): + assert ask(Q.singular(X)) is None + assert ask(Q.singular(X), Q.invertible(X)) is False + assert ask(Q.singular(X), ~Q.invertible(X)) is True + +@XFAIL +def test_invertible_fullrank(): + assert ask(Q.invertible(X), Q.fullrank(X)) is True + + +def test_invertible_BlockMatrix(): + assert ask(Q.invertible(BlockMatrix([Identity(3)]))) == True + assert ask(Q.invertible(BlockMatrix([ZeroMatrix(3, 3)]))) == False + + X = Matrix([[1, 2, 3], [3, 5, 4]]) + Y = Matrix([[4, 2, 7], [2, 3, 5]]) + # non-invertible A block + assert ask(Q.invertible(BlockMatrix([ + [Matrix.ones(3, 3), Y.T], + [X, Matrix.eye(2)], + ]))) == True + # non-invertible B block + assert ask(Q.invertible(BlockMatrix([ + [Y.T, Matrix.ones(3, 3)], + [Matrix.eye(2), X], + ]))) == True + # non-invertible C block + assert ask(Q.invertible(BlockMatrix([ + [X, Matrix.eye(2)], + [Matrix.ones(3, 3), Y.T], + ]))) == True + # non-invertible D block + assert ask(Q.invertible(BlockMatrix([ + [Matrix.eye(2), X], + [Y.T, Matrix.ones(3, 3)], + ]))) == True + + +def test_invertible_BlockDiagMatrix(): + assert ask(Q.invertible(BlockDiagMatrix(Identity(3), Identity(5)))) == True + assert ask(Q.invertible(BlockDiagMatrix(ZeroMatrix(3, 3), Identity(5)))) == False + assert ask(Q.invertible(BlockDiagMatrix(Identity(3), OneMatrix(5, 5)))) == False + + +def test_symmetric(): + assert ask(Q.symmetric(X), Q.symmetric(X)) + assert ask(Q.symmetric(X*Z), Q.symmetric(X)) is None + assert ask(Q.symmetric(X*Z), Q.symmetric(X) & Q.symmetric(Z)) is True + assert ask(Q.symmetric(X + Z), Q.symmetric(X) & Q.symmetric(Z)) is True + assert ask(Q.symmetric(Y)) is False + assert ask(Q.symmetric(Y*Y.T)) is True + assert ask(Q.symmetric(Y.T*X*Y)) is None + assert ask(Q.symmetric(Y.T*X*Y), Q.symmetric(X)) is True + assert ask(Q.symmetric(X**10), Q.symmetric(X)) is True + assert ask(Q.symmetric(A1x1)) is True + assert ask(Q.symmetric(A1x1 + B1x1)) is True + assert ask(Q.symmetric(A1x1 * B1x1)) is True + assert ask(Q.symmetric(V1.T*V1)) is True + assert ask(Q.symmetric(V1.T*(V1 + V2))) is True + assert ask(Q.symmetric(V1.T*(V1 + V2) + A1x1)) is True + assert ask(Q.symmetric(MatrixSlice(Y, (0, 1), (1, 2)))) is True + assert ask(Q.symmetric(Identity(3))) is True + assert ask(Q.symmetric(ZeroMatrix(3, 3))) is True + assert ask(Q.symmetric(OneMatrix(3, 3))) is True + +def _test_orthogonal_unitary(predicate): + assert ask(predicate(X), predicate(X)) + assert ask(predicate(X.T), predicate(X)) is True + assert ask(predicate(X.I), predicate(X)) is True + assert ask(predicate(X**2), predicate(X)) + assert ask(predicate(Y)) is False + assert ask(predicate(X)) is None + assert ask(predicate(X), ~Q.invertible(X)) is False + assert ask(predicate(X*Z*X), predicate(X) & predicate(Z)) is True + assert ask(predicate(Identity(3))) is True + assert ask(predicate(ZeroMatrix(3, 3))) is False + assert ask(Q.invertible(X), predicate(X)) + assert not ask(predicate(X + Z), predicate(X) & predicate(Z)) + +def test_orthogonal(): + _test_orthogonal_unitary(Q.orthogonal) + +def test_unitary(): + _test_orthogonal_unitary(Q.unitary) + assert ask(Q.unitary(X), Q.orthogonal(X)) + +def test_fullrank(): + assert ask(Q.fullrank(X), Q.fullrank(X)) + assert ask(Q.fullrank(X**2), Q.fullrank(X)) + assert ask(Q.fullrank(X.T), Q.fullrank(X)) is True + assert ask(Q.fullrank(X)) is None + assert ask(Q.fullrank(Y)) is None + assert ask(Q.fullrank(X*Z), Q.fullrank(X) & Q.fullrank(Z)) is True + assert ask(Q.fullrank(Identity(3))) is True + assert ask(Q.fullrank(ZeroMatrix(3, 3))) is False + assert ask(Q.fullrank(OneMatrix(1, 1))) is True + assert ask(Q.fullrank(OneMatrix(3, 3))) is False + assert ask(Q.invertible(X), ~Q.fullrank(X)) == False + + +def test_positive_definite(): + assert ask(Q.positive_definite(X), Q.positive_definite(X)) + assert ask(Q.positive_definite(X.T), Q.positive_definite(X)) is True + assert ask(Q.positive_definite(X.I), Q.positive_definite(X)) is True + assert ask(Q.positive_definite(Y)) is False + assert ask(Q.positive_definite(X)) is None + assert ask(Q.positive_definite(X**3), Q.positive_definite(X)) + assert ask(Q.positive_definite(X*Z*X), + Q.positive_definite(X) & Q.positive_definite(Z)) is True + assert ask(Q.positive_definite(X), Q.orthogonal(X)) + assert ask(Q.positive_definite(Y.T*X*Y), + Q.positive_definite(X) & Q.fullrank(Y)) is True + assert not ask(Q.positive_definite(Y.T*X*Y), Q.positive_definite(X)) + assert ask(Q.positive_definite(Identity(3))) is True + assert ask(Q.positive_definite(ZeroMatrix(3, 3))) is False + assert ask(Q.positive_definite(OneMatrix(1, 1))) is True + assert ask(Q.positive_definite(OneMatrix(3, 3))) is False + assert ask(Q.positive_definite(X + Z), Q.positive_definite(X) & + Q.positive_definite(Z)) is True + assert not ask(Q.positive_definite(-X), Q.positive_definite(X)) + assert ask(Q.positive(X[1, 1]), Q.positive_definite(X)) + +def test_triangular(): + assert ask(Q.upper_triangular(X + Z.T + Identity(2)), Q.upper_triangular(X) & + Q.lower_triangular(Z)) is True + assert ask(Q.upper_triangular(X*Z.T), Q.upper_triangular(X) & + Q.lower_triangular(Z)) is True + assert ask(Q.lower_triangular(Identity(3))) is True + assert ask(Q.lower_triangular(ZeroMatrix(3, 3))) is True + assert ask(Q.upper_triangular(ZeroMatrix(3, 3))) is True + assert ask(Q.lower_triangular(OneMatrix(1, 1))) is True + assert ask(Q.upper_triangular(OneMatrix(1, 1))) is True + assert ask(Q.lower_triangular(OneMatrix(3, 3))) is False + assert ask(Q.upper_triangular(OneMatrix(3, 3))) is False + assert ask(Q.triangular(X), Q.unit_triangular(X)) + assert ask(Q.upper_triangular(X**3), Q.upper_triangular(X)) + assert ask(Q.lower_triangular(X**3), Q.lower_triangular(X)) + + +def test_diagonal(): + assert ask(Q.diagonal(X + Z.T + Identity(2)), Q.diagonal(X) & + Q.diagonal(Z)) is True + assert ask(Q.diagonal(ZeroMatrix(3, 3))) + assert ask(Q.diagonal(OneMatrix(1, 1))) is True + assert ask(Q.diagonal(OneMatrix(3, 3))) is False + assert ask(Q.lower_triangular(X) & Q.upper_triangular(X), Q.diagonal(X)) + assert ask(Q.diagonal(X), Q.lower_triangular(X) & Q.upper_triangular(X)) + assert ask(Q.symmetric(X), Q.diagonal(X)) + assert ask(Q.triangular(X), Q.diagonal(X)) + assert ask(Q.diagonal(C0x0)) + assert ask(Q.diagonal(A1x1)) + assert ask(Q.diagonal(A1x1 + B1x1)) + assert ask(Q.diagonal(A1x1*B1x1)) + assert ask(Q.diagonal(V1.T*V2)) + assert ask(Q.diagonal(V1.T*(X + Z)*V1)) + assert ask(Q.diagonal(MatrixSlice(Y, (0, 1), (1, 2)))) is True + assert ask(Q.diagonal(V1.T*(V1 + V2))) is True + assert ask(Q.diagonal(X**3), Q.diagonal(X)) + assert ask(Q.diagonal(Identity(3))) + assert ask(Q.diagonal(DiagMatrix(V1))) + assert ask(Q.diagonal(DiagonalMatrix(X))) + + +def test_non_atoms(): + assert ask(Q.real(Trace(X)), Q.positive(Trace(X))) + +@XFAIL +def test_non_trivial_implies(): + X = MatrixSymbol('X', 3, 3) + Y = MatrixSymbol('Y', 3, 3) + assert ask(Q.lower_triangular(X+Y), Q.lower_triangular(X) & + Q.lower_triangular(Y)) is True + assert ask(Q.triangular(X), Q.lower_triangular(X)) is True + assert ask(Q.triangular(X+Y), Q.lower_triangular(X) & + Q.lower_triangular(Y)) is True + +def test_MatrixSlice(): + X = MatrixSymbol('X', 4, 4) + B = MatrixSlice(X, (1, 3), (1, 3)) + C = MatrixSlice(X, (0, 3), (1, 3)) + assert ask(Q.symmetric(B), Q.symmetric(X)) + assert ask(Q.invertible(B), Q.invertible(X)) + assert ask(Q.diagonal(B), Q.diagonal(X)) + assert ask(Q.orthogonal(B), Q.orthogonal(X)) + assert ask(Q.upper_triangular(B), Q.upper_triangular(X)) + + assert not ask(Q.symmetric(C), Q.symmetric(X)) + assert not ask(Q.invertible(C), Q.invertible(X)) + assert not ask(Q.diagonal(C), Q.diagonal(X)) + assert not ask(Q.orthogonal(C), Q.orthogonal(X)) + assert not ask(Q.upper_triangular(C), Q.upper_triangular(X)) + +def test_det_trace_positive(): + X = MatrixSymbol('X', 4, 4) + assert ask(Q.positive(Trace(X)), Q.positive_definite(X)) + assert ask(Q.positive(Determinant(X)), Q.positive_definite(X)) + +def test_field_assumptions(): + X = MatrixSymbol('X', 4, 4) + Y = MatrixSymbol('Y', 4, 4) + assert ask(Q.real_elements(X), Q.real_elements(X)) + assert not ask(Q.integer_elements(X), Q.real_elements(X)) + assert ask(Q.complex_elements(X), Q.real_elements(X)) + assert ask(Q.complex_elements(X**2), Q.real_elements(X)) + assert ask(Q.real_elements(X**2), Q.integer_elements(X)) + assert ask(Q.real_elements(X+Y), Q.real_elements(X)) is None + assert ask(Q.real_elements(X+Y), Q.real_elements(X) & Q.real_elements(Y)) + from sympy.matrices.expressions.hadamard import HadamardProduct + assert ask(Q.real_elements(HadamardProduct(X, Y)), + Q.real_elements(X) & Q.real_elements(Y)) + assert ask(Q.complex_elements(X+Y), Q.real_elements(X) & Q.complex_elements(Y)) + + assert ask(Q.real_elements(X.T), Q.real_elements(X)) + assert ask(Q.real_elements(X.I), Q.real_elements(X) & Q.invertible(X)) + assert ask(Q.real_elements(Trace(X)), Q.real_elements(X)) + assert ask(Q.integer_elements(Determinant(X)), Q.integer_elements(X)) + assert not ask(Q.integer_elements(X.I), Q.integer_elements(X)) + alpha = Symbol('alpha') + assert ask(Q.real_elements(alpha*X), Q.real_elements(X) & Q.real(alpha)) + assert ask(Q.real_elements(LofLU(X)), Q.real_elements(X)) + e = Symbol('e', integer=True, negative=True) + assert ask(Q.real_elements(X**e), Q.real_elements(X) & Q.invertible(X)) + assert ask(Q.real_elements(X**e), Q.real_elements(X)) is None + +def test_matrix_element_sets(): + X = MatrixSymbol('X', 4, 4) + assert ask(Q.real(X[1, 2]), Q.real_elements(X)) + assert ask(Q.integer(X[1, 2]), Q.integer_elements(X)) + assert ask(Q.complex(X[1, 2]), Q.complex_elements(X)) + assert ask(Q.integer_elements(Identity(3))) + assert ask(Q.integer_elements(ZeroMatrix(3, 3))) + assert ask(Q.integer_elements(OneMatrix(3, 3))) + from sympy.matrices.expressions.fourier import DFT + assert ask(Q.complex_elements(DFT(3))) + + +def test_matrix_element_sets_slices_blocks(): + X = MatrixSymbol('X', 4, 4) + assert ask(Q.integer_elements(X[:, 3]), Q.integer_elements(X)) + assert ask(Q.integer_elements(BlockMatrix([[X], [X]])), + Q.integer_elements(X)) + +def test_matrix_element_sets_determinant_trace(): + assert ask(Q.integer(Determinant(X)), Q.integer_elements(X)) + assert ask(Q.integer(Trace(X)), Q.integer_elements(X)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_query.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_query.py new file mode 100644 index 0000000000000000000000000000000000000000..e1ae1f1e482e5c9d19e3dcce3f37ad46b6821817 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_query.py @@ -0,0 +1,2541 @@ +from sympy.abc import t, w, x, y, z, n, k, m, p, i +from sympy.assumptions import (ask, AssumptionsContext, Q, register_handler, + remove_handler) +from sympy.assumptions.assume import assuming, global_assumptions, Predicate +from sympy.assumptions.cnf import CNF, Literal +from sympy.assumptions.facts import (single_fact_lookup, + get_known_facts, generate_known_facts_dict, get_known_facts_keys) +from sympy.assumptions.handlers import AskHandler +from sympy.assumptions.ask_generated import (get_all_known_facts, + get_known_facts_dict) +from sympy.core.add import Add +from sympy.core.numbers import (I, Integer, Rational, oo, zoo, pi) +from sympy.core.singleton import S +from sympy.core.power import Pow +from sympy.core.symbol import Str, symbols, Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (Abs, im, re, sign) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import ( + acos, acot, asin, atan, cos, cot, sin, tan) +from sympy.logic.boolalg import Equivalent, Implies, Xor, And, to_cnf +from sympy.matrices import Matrix, SparseMatrix +from sympy.testing.pytest import (XFAIL, slow, raises, warns_deprecated_sympy, + _both_exp_pow) +import math + + +def test_int_1(): + z = 1 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is True + assert ask(Q.rational(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is True + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_int_11(): + z = 11 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is True + assert ask(Q.rational(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is True + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is True + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_int_12(): + z = 12 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is True + assert ask(Q.rational(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is True + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is True + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_float_1(): + z = 1.0 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is None + assert ask(Q.rational(z)) is None + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is None + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is None + assert ask(Q.odd(z)) is None + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is None + assert ask(Q.composite(z)) is None + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + z = 7.2123 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is None + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is None + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + # test for issue #12168 + assert ask(Q.rational(math.pi)) is None + + +def test_zero_0(): + z = Integer(0) + assert ask(Q.nonzero(z)) is False + assert ask(Q.zero(z)) is True + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is True + assert ask(Q.rational(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is False + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is True + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is True + + +def test_negativeone(): + z = Integer(-1) + assert ask(Q.nonzero(z)) is True + assert ask(Q.zero(z)) is False + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is True + assert ask(Q.rational(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is False + assert ask(Q.negative(z)) is True + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is True + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_infinity(): + assert ask(Q.commutative(oo)) is True + assert ask(Q.integer(oo)) is False + assert ask(Q.rational(oo)) is False + assert ask(Q.algebraic(oo)) is False + assert ask(Q.real(oo)) is False + assert ask(Q.extended_real(oo)) is True + assert ask(Q.complex(oo)) is False + assert ask(Q.irrational(oo)) is False + assert ask(Q.imaginary(oo)) is False + assert ask(Q.positive(oo)) is False + assert ask(Q.extended_positive(oo)) is True + assert ask(Q.negative(oo)) is False + assert ask(Q.even(oo)) is False + assert ask(Q.odd(oo)) is False + assert ask(Q.finite(oo)) is False + assert ask(Q.infinite(oo)) is True + assert ask(Q.prime(oo)) is False + assert ask(Q.composite(oo)) is False + assert ask(Q.hermitian(oo)) is False + assert ask(Q.antihermitian(oo)) is False + assert ask(Q.positive_infinite(oo)) is True + assert ask(Q.negative_infinite(oo)) is False + + +def test_neg_infinity(): + mm = S.NegativeInfinity + assert ask(Q.commutative(mm)) is True + assert ask(Q.integer(mm)) is False + assert ask(Q.rational(mm)) is False + assert ask(Q.algebraic(mm)) is False + assert ask(Q.real(mm)) is False + assert ask(Q.extended_real(mm)) is True + assert ask(Q.complex(mm)) is False + assert ask(Q.irrational(mm)) is False + assert ask(Q.imaginary(mm)) is False + assert ask(Q.positive(mm)) is False + assert ask(Q.negative(mm)) is False + assert ask(Q.extended_negative(mm)) is True + assert ask(Q.even(mm)) is False + assert ask(Q.odd(mm)) is False + assert ask(Q.finite(mm)) is False + assert ask(Q.infinite(oo)) is True + assert ask(Q.prime(mm)) is False + assert ask(Q.composite(mm)) is False + assert ask(Q.hermitian(mm)) is False + assert ask(Q.antihermitian(mm)) is False + assert ask(Q.positive_infinite(-oo)) is False + assert ask(Q.negative_infinite(-oo)) is True + + +def test_complex_infinity(): + assert ask(Q.commutative(zoo)) is True + assert ask(Q.integer(zoo)) is False + assert ask(Q.rational(zoo)) is False + assert ask(Q.algebraic(zoo)) is False + assert ask(Q.real(zoo)) is False + assert ask(Q.extended_real(zoo)) is False + assert ask(Q.complex(zoo)) is False + assert ask(Q.irrational(zoo)) is False + assert ask(Q.imaginary(zoo)) is False + assert ask(Q.positive(zoo)) is False + assert ask(Q.negative(zoo)) is False + assert ask(Q.zero(zoo)) is False + assert ask(Q.nonzero(zoo)) is False + assert ask(Q.even(zoo)) is False + assert ask(Q.odd(zoo)) is False + assert ask(Q.finite(zoo)) is False + assert ask(Q.infinite(zoo)) is True + assert ask(Q.prime(zoo)) is False + assert ask(Q.composite(zoo)) is False + assert ask(Q.hermitian(zoo)) is False + assert ask(Q.antihermitian(zoo)) is False + assert ask(Q.positive_infinite(zoo)) is False + assert ask(Q.negative_infinite(zoo)) is False + + +def test_nan(): + nan = S.NaN + assert ask(Q.commutative(nan)) is True + assert ask(Q.integer(nan)) is None + assert ask(Q.rational(nan)) is None + assert ask(Q.algebraic(nan)) is None + assert ask(Q.real(nan)) is None + assert ask(Q.extended_real(nan)) is None + assert ask(Q.complex(nan)) is None + assert ask(Q.irrational(nan)) is None + assert ask(Q.imaginary(nan)) is None + assert ask(Q.positive(nan)) is None + assert ask(Q.nonzero(nan)) is None + assert ask(Q.zero(nan)) is None + assert ask(Q.even(nan)) is None + assert ask(Q.odd(nan)) is None + assert ask(Q.finite(nan)) is None + assert ask(Q.infinite(nan)) is None + assert ask(Q.prime(nan)) is None + assert ask(Q.composite(nan)) is None + assert ask(Q.hermitian(nan)) is None + assert ask(Q.antihermitian(nan)) is None + + +def test_Rational_number(): + r = Rational(3, 4) + assert ask(Q.commutative(r)) is True + assert ask(Q.integer(r)) is False + assert ask(Q.rational(r)) is True + assert ask(Q.real(r)) is True + assert ask(Q.complex(r)) is True + assert ask(Q.irrational(r)) is False + assert ask(Q.imaginary(r)) is False + assert ask(Q.positive(r)) is True + assert ask(Q.negative(r)) is False + assert ask(Q.even(r)) is False + assert ask(Q.odd(r)) is False + assert ask(Q.finite(r)) is True + assert ask(Q.prime(r)) is False + assert ask(Q.composite(r)) is False + assert ask(Q.hermitian(r)) is True + assert ask(Q.antihermitian(r)) is False + + r = Rational(1, 4) + assert ask(Q.positive(r)) is True + assert ask(Q.negative(r)) is False + + r = Rational(5, 4) + assert ask(Q.negative(r)) is False + assert ask(Q.positive(r)) is True + + r = Rational(5, 3) + assert ask(Q.positive(r)) is True + assert ask(Q.negative(r)) is False + + r = Rational(-3, 4) + assert ask(Q.positive(r)) is False + assert ask(Q.negative(r)) is True + + r = Rational(-1, 4) + assert ask(Q.positive(r)) is False + assert ask(Q.negative(r)) is True + + r = Rational(-5, 4) + assert ask(Q.negative(r)) is True + assert ask(Q.positive(r)) is False + + r = Rational(-5, 3) + assert ask(Q.positive(r)) is False + assert ask(Q.negative(r)) is True + + +def test_sqrt_2(): + z = sqrt(2) + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_pi(): + z = S.Pi + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + z = S.Pi + 1 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + z = 2*S.Pi + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + z = S.Pi ** 2 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + z = (1 + S.Pi) ** 2 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is None + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_E(): + z = S.Exp1 + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is False + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_GoldenRatio(): + z = S.GoldenRatio + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_TribonacciConstant(): + z = S.TribonacciConstant + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is True + assert ask(Q.real(z)) is True + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is True + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is True + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is True + assert ask(Q.antihermitian(z)) is False + + +def test_I(): + z = I + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is True + assert ask(Q.real(z)) is False + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is True + assert ask(Q.positive(z)) is False + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is False + assert ask(Q.antihermitian(z)) is True + + z = 1 + I + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is True + assert ask(Q.real(z)) is False + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is False + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is False + assert ask(Q.antihermitian(z)) is False + + z = I*(1 + I) + assert ask(Q.commutative(z)) is True + assert ask(Q.integer(z)) is False + assert ask(Q.rational(z)) is False + assert ask(Q.algebraic(z)) is True + assert ask(Q.real(z)) is False + assert ask(Q.complex(z)) is True + assert ask(Q.irrational(z)) is False + assert ask(Q.imaginary(z)) is False + assert ask(Q.positive(z)) is False + assert ask(Q.negative(z)) is False + assert ask(Q.even(z)) is False + assert ask(Q.odd(z)) is False + assert ask(Q.finite(z)) is True + assert ask(Q.prime(z)) is False + assert ask(Q.composite(z)) is False + assert ask(Q.hermitian(z)) is False + assert ask(Q.antihermitian(z)) is False + + z = I**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (-I)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (3*I)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is False + + z = (1)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (-1)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (1+I)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is False + + z = (I)**(I+3) + assert ask(Q.imaginary(z)) is True + assert ask(Q.real(z)) is False + + z = (I)**(I+2) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (I)**(2) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + + z = (I)**(3) + assert ask(Q.imaginary(z)) is True + assert ask(Q.real(z)) is False + + z = (3)**(I) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is False + + z = (I)**(0) + assert ask(Q.imaginary(z)) is False + assert ask(Q.real(z)) is True + +def test_bounded(): + x, y, z = symbols('x,y,z') + a = x + y + x, y = a.args + assert ask(Q.finite(a), Q.positive_infinite(y)) is None + assert ask(Q.finite(x)) is None + assert ask(Q.finite(x), Q.finite(x)) is True + assert ask(Q.finite(x), Q.finite(y)) is None + assert ask(Q.finite(x), Q.complex(x)) is True + assert ask(Q.finite(x), Q.extended_real(x)) is None + + assert ask(Q.finite(x + 1)) is None + assert ask(Q.finite(x + 1), Q.finite(x)) is True + a = x + y + x, y = a.args + # B + B + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y)) is True + assert ask(Q.finite(a), Q.positive(x) & Q.finite(y)) is True + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y)) is True + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y)) is True + assert ask(Q.finite(a), Q.positive(x) & Q.finite(y) + & ~Q.positive(y)) is True + assert ask(Q.finite(a), Q.finite(x) & ~Q.positive(x) + & Q.positive(y)) is True + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) & ~Q.positive(x) + & ~Q.positive(y)) is True + # B + U + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y)) is False + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y)) is False + assert ask(Q.finite(a), Q.finite(x) + & Q.positive_infinite(y)) is False + assert ask(Q.finite(a), Q.positive(x) + & Q.positive_infinite(y)) is False + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y) + & ~Q.positive(y)) is False + assert ask(Q.finite(a), Q.finite(x) & ~Q.positive(x) + & Q.positive_infinite(y)) is False + assert ask(Q.finite(a), Q.finite(x) & ~Q.positive(x) & ~Q.finite(y) + & ~Q.positive(y)) is False + # B + ? + assert ask(Q.finite(a), Q.finite(x)) is None + assert ask(Q.finite(a), Q.positive(x)) is None + assert ask(Q.finite(a), Q.finite(x) + & Q.extended_positive(y)) is None + assert ask(Q.finite(a), Q.positive(x) + & Q.extended_positive(y)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.positive(y)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.positive(x) + & Q.extended_positive(y)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.positive(x) + & ~Q.positive(y)) is None + # U + U + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & ~Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.positive_infinite(y)) is False + assert ask(Q.finite(a), Q.positive_infinite(x) & ~Q.finite(y) + & ~Q.extended_positive(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.extended_positive(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & ~Q.extended_positive(x) & ~Q.extended_positive(y)) is False + # U + ? + assert ask(Q.finite(a), ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.extended_positive(x) + & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.extended_positive(x) + & Q.positive_infinite(y)) is False + assert ask(Q.finite(a), Q.extended_positive(x) + & ~Q.finite(y) & ~Q.extended_positive(y)) is None + assert ask(Q.finite(a), ~Q.extended_positive(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), ~Q.extended_positive(x) & ~Q.finite(y) + & ~Q.extended_positive(y)) is False + # ? + ? + assert ask(Q.finite(a)) is None + assert ask(Q.finite(a), Q.extended_positive(x)) is None + assert ask(Q.finite(a), Q.extended_positive(y)) is None + assert ask(Q.finite(a), Q.extended_positive(x) + & Q.extended_positive(y)) is None + assert ask(Q.finite(a), Q.extended_positive(x) + & ~Q.extended_positive(y)) is None + assert ask(Q.finite(a), ~Q.extended_positive(x) + & Q.extended_positive(y)) is None + assert ask(Q.finite(a), ~Q.extended_positive(x) + & ~Q.extended_positive(y)) is None + + x, y, z = symbols('x,y,z') + a = x + y + z + x, y, z = a.args + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.negative(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.finite(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.finite(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.extended_positive(y) + & Q.finite(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative_infinite(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.negative_infinite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative_infinite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative_infinite(y) + & Q.extended_negative(z)) is False + assert ask(Q.finite(a), Q.negative(x) + & Q.negative_infinite(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.negative_infinite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & ~Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.negative(x) & ~Q.finite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.negative(x) & ~Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.negative(x) & ~Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.positive_infinite(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.positive_infinite(y) + & Q.negative_infinite(z)) is None + assert ask(Q.finite(a), Q.negative(x) & + Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.positive_infinite(y) + & Q.extended_positive(z)) is False + assert ask(Q.finite(a), Q.negative(x) & Q.extended_negative(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.extended_negative(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x)) is None + assert ask(Q.finite(a), Q.negative(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative(x) & Q.extended_positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.finite(z)) is True + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.negative_infinite(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.negative_infinite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.negative_infinite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.negative_infinite(y) + & Q.extended_negative(z)) is False + assert ask(Q.finite(a), Q.finite(x) + & Q.negative_infinite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.negative_infinite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.positive_infinite(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.positive_infinite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.finite(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.positive_infinite(y) + & Q.extended_positive(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.extended_negative(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.finite(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.extended_negative(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x)) is None + assert ask(Q.finite(a), Q.finite(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.extended_positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & Q.positive(z)) is True + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.negative_infinite(y) + & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.negative_infinite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.negative_infinite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.negative_infinite(y) + & Q.extended_negative(z)) is False + assert ask(Q.finite(a), Q.positive(x) + & Q.negative_infinite(y)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.negative_infinite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.positive(x) & ~Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.positive_infinite(y) + & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.positive_infinite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.positive_infinite(y) + & Q.extended_positive(z)) is False + assert ask(Q.finite(a), Q.positive(x) & Q.extended_negative(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.extended_negative(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x)) is None + assert ask(Q.finite(a), Q.positive(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive(x) & Q.extended_positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y) & Q.negative_infinite(z)) is False + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y) & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y)& Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y) & Q.extended_negative(z)) is False + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.negative_infinite(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & ~Q.finite(y) & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & ~Q.finite(y) & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & ~Q.finite(y) & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & ~Q.finite(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.positive_infinite(y) & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.positive_infinite(y) & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.positive_infinite(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.extended_negative(y) & Q.extended_negative(z)) is False + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.extended_negative(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.negative_infinite(x) + & Q.extended_positive(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.positive_infinite(z) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.positive_infinite(y) + & Q.positive_infinite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.positive_infinite(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.positive_infinite(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.extended_negative(y) + & Q.extended_negative(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.extended_negative(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), ~Q.finite(x)) is None + assert ask(Q.finite(a), ~Q.finite(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.extended_positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.positive_infinite(y) & Q.positive_infinite(z)) is False + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.positive_infinite(y) & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.positive_infinite(y)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.positive_infinite(y) & Q.extended_positive(z)) is False + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.extended_negative(y) & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.extended_negative(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive_infinite(x)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.positive_infinite(x) + & Q.extended_positive(y) & Q.extended_positive(z)) is False + assert ask(Q.finite(a), Q.extended_negative(x) + & Q.extended_negative(y) & Q.extended_negative(z)) is None + assert ask(Q.finite(a), Q.extended_negative(x) + & Q.extended_negative(y)) is None + assert ask(Q.finite(a), Q.extended_negative(x) + & Q.extended_negative(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.extended_negative(x)) is None + assert ask(Q.finite(a), Q.extended_negative(x) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.extended_negative(x) + & Q.extended_positive(y) & Q.extended_positive(z)) is None + assert ask(Q.finite(a)) is None + assert ask(Q.finite(a), Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.extended_positive(y) + & Q.extended_positive(z)) is None + assert ask(Q.finite(a), Q.extended_positive(x) + & Q.extended_positive(y) & Q.extended_positive(z)) is None + + assert ask(Q.finite(2*x)) is None + assert ask(Q.finite(2*x), Q.finite(x)) is True + + x, y, z = symbols('x,y,z') + a = x*y + x, y = a.args + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y)) is True + assert ask(Q.finite(a), Q.finite(x) & ~Q.zero(x) & ~Q.finite(y)) is False + assert ask(Q.finite(a), Q.finite(x)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y) &~Q.zero(y)) is False + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y)) is False + assert ask(Q.finite(a), ~Q.finite(x)) is None + assert ask(Q.finite(a), Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(y)) is None + assert ask(Q.finite(a)) is None + a = x*y*z + x, y, z = a.args + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & Q.finite(z)) is True + assert ask(Q.finite(a), Q.finite(x) & ~Q.zero(x) & Q.finite(y) + & ~Q.zero(y) & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.zero(x) & ~Q.finite(y) + & Q.finite(z) & ~Q.zero(z)) is False + assert ask(Q.finite(a), Q.finite(x) & ~Q.zero(x) & ~Q.finite(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.finite(x) & Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(x)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y) & ~Q.zero(y) + & Q.finite(z) & ~Q.zero(z)) is False + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.zero(x) & Q.finite(y) + & ~Q.zero(y) & ~Q.finite(z)) is False + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & Q.finite(z) & ~Q.zero(z)) is False + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & ~Q.finite(z)) is False + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x)) is None + assert ask(Q.finite(a), Q.finite(y) & Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(y) & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(y) & Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(y) & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(y)) is None + assert ask(Q.finite(a), Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(z) & Q.extended_nonzero(x) + & Q.extended_nonzero(y) & Q.extended_nonzero(z)) is None + assert ask(Q.finite(a), Q.extended_nonzero(x) & ~Q.finite(y) + & Q.extended_nonzero(y) & ~Q.finite(z) + & Q.extended_nonzero(z)) is False + + x, y, z = symbols('x,y,z') + assert ask(Q.finite(x**2)) is None + assert ask(Q.finite(2**x)) is None + assert ask(Q.finite(2**x), Q.finite(x)) is True + assert ask(Q.finite(x**x)) is None + assert ask(Q.finite(S.Half ** x)) is None + assert ask(Q.finite(S.Half ** x), Q.extended_positive(x)) is True + assert ask(Q.finite(S.Half ** x), Q.extended_negative(x)) is None + assert ask(Q.finite(2**x), Q.extended_negative(x)) is True + assert ask(Q.finite(sqrt(x))) is None + assert ask(Q.finite(2**x), ~Q.finite(x)) is False + assert ask(Q.finite(x**2), ~Q.finite(x)) is False + + # https://github.com/sympy/sympy/issues/27707 + assert ask(Q.finite(x**y), Q.real(x) & Q.real(y)) is None + assert ask(Q.finite(x**y), Q.real(x) & Q.negative(y)) is None + assert ask(Q.finite(x**y), Q.zero(x) & Q.negative(y)) is False + assert ask(Q.finite(x**y), Q.real(x) & Q.positive(y)) is True + assert ask(Q.finite(x**y), Q.nonzero(x) & Q.real(y)) is True + assert ask(Q.finite(x**y), Q.nonzero(x) & Q.negative(y)) is True + assert ask(Q.finite(x**y), Q.zero(x) & Q.positive(y)) is True + + # sign function + assert ask(Q.finite(sign(x))) is True + assert ask(Q.finite(sign(x)), ~Q.finite(x)) is True + + # exponential functions + assert ask(Q.finite(log(x))) is None + assert ask(Q.finite(log(x)), Q.finite(x)) is None + assert ask(Q.finite(log(x)), ~Q.zero(x)) is True + assert ask(Q.finite(log(x)), Q.infinite(x)) is False + assert ask(Q.finite(log(x)), Q.zero(x)) is False + assert ask(Q.finite(exp(x))) is None + assert ask(Q.finite(exp(x)), Q.finite(x)) is True + assert ask(Q.finite(exp(2))) is True + + # trigonometric functions + assert ask(Q.finite(sin(x))) is True + assert ask(Q.finite(sin(x)), ~Q.finite(x)) is True + assert ask(Q.finite(cos(x))) is True + assert ask(Q.finite(cos(x)), ~Q.finite(x)) is True + assert ask(Q.finite(2*sin(x))) is True + assert ask(Q.finite(sin(x)**2)) is True + assert ask(Q.finite(cos(x)**2)) is True + assert ask(Q.finite(cos(x) + sin(x))) is True + + +def test_unbounded(): + assert ask(Q.infinite(I * oo)) is True + assert ask(Q.infinite(1 + I*oo)) is True + assert ask(Q.infinite(3 * (I * oo))) is True + assert ask(Q.infinite(-I * oo)) is True + assert ask(Q.infinite(1 + zoo)) is True + assert ask(Q.infinite(I * zoo)) is True + assert ask(Q.infinite(x / y), Q.infinite(x) & Q.finite(y) & ~Q.zero(y)) is True + assert ask(Q.infinite(I * oo - I * oo)) is None + assert ask(Q.infinite(x * I * oo)) is None + assert ask(Q.infinite(1 / x), Q.finite(x) & ~Q.zero(x)) is False + assert ask(Q.infinite(1 / (I * oo))) is False + + +def test_issue_27441(): + # https://github.com/sympy/sympy/issues/27441 + assert ask(Q.composite(y), Q.integer(y) & Q.positive(y) & ~Q.prime(y)) is None + + +def test_issue_27447(): + x,y,z = symbols('x y z') + a = x*y + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y)) is None + + a = x*y*z + assert ask(Q.finite(a), Q.finite(x) & Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & Q.finite(z) ) is None + assert ask(Q.finite(a), Q.finite(x) & ~Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y) + & Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & Q.finite(y) + & ~Q.finite(z)) is None + assert ask(Q.finite(a), ~Q.finite(x) & ~Q.finite(y) + & Q.finite(z)) is None + + +@XFAIL +def test_issue_27662_xfail(): + assert ask(Q.finite(x*y), ~Q.finite(x) + & Q.zero(y)) is None + + +@XFAIL +def test_bounded_xfail(): + """We need to support relations in ask for this to work""" + assert ask(Q.finite(sin(x)**x)) is True + assert ask(Q.finite(cos(x)**x)) is True + + +def test_commutative(): + """By default objects are Q.commutative that is why it returns True + for both key=True and key=False""" + assert ask(Q.commutative(x)) is True + assert ask(Q.commutative(x), ~Q.commutative(x)) is False + assert ask(Q.commutative(x), Q.complex(x)) is True + assert ask(Q.commutative(x), Q.imaginary(x)) is True + assert ask(Q.commutative(x), Q.real(x)) is True + assert ask(Q.commutative(x), Q.positive(x)) is True + assert ask(Q.commutative(x), ~Q.commutative(y)) is True + + assert ask(Q.commutative(2*x)) is True + assert ask(Q.commutative(2*x), ~Q.commutative(x)) is False + + assert ask(Q.commutative(x + 1)) is True + assert ask(Q.commutative(x + 1), ~Q.commutative(x)) is False + + assert ask(Q.commutative(x**2)) is True + assert ask(Q.commutative(x**2), ~Q.commutative(x)) is False + + assert ask(Q.commutative(log(x))) is True + + +@_both_exp_pow +def test_complex(): + assert ask(Q.complex(x)) is None + assert ask(Q.complex(x), Q.complex(x)) is True + assert ask(Q.complex(x), Q.complex(y)) is None + assert ask(Q.complex(x), ~Q.complex(x)) is False + assert ask(Q.complex(x), Q.real(x)) is True + assert ask(Q.complex(x), ~Q.real(x)) is None + assert ask(Q.complex(x), Q.rational(x)) is True + assert ask(Q.complex(x), Q.irrational(x)) is True + assert ask(Q.complex(x), Q.positive(x)) is True + assert ask(Q.complex(x), Q.imaginary(x)) is True + assert ask(Q.complex(x), Q.algebraic(x)) is True + + # a+b + assert ask(Q.complex(x + 1), Q.complex(x)) is True + assert ask(Q.complex(x + 1), Q.real(x)) is True + assert ask(Q.complex(x + 1), Q.rational(x)) is True + assert ask(Q.complex(x + 1), Q.irrational(x)) is True + assert ask(Q.complex(x + 1), Q.imaginary(x)) is True + assert ask(Q.complex(x + 1), Q.integer(x)) is True + assert ask(Q.complex(x + 1), Q.even(x)) is True + assert ask(Q.complex(x + 1), Q.odd(x)) is True + assert ask(Q.complex(x + y), Q.complex(x) & Q.complex(y)) is True + assert ask(Q.complex(x + y), Q.real(x) & Q.imaginary(y)) is True + + # a*x +b + assert ask(Q.complex(2*x + 1), Q.complex(x)) is True + assert ask(Q.complex(2*x + 1), Q.real(x)) is True + assert ask(Q.complex(2*x + 1), Q.positive(x)) is True + assert ask(Q.complex(2*x + 1), Q.rational(x)) is True + assert ask(Q.complex(2*x + 1), Q.irrational(x)) is True + assert ask(Q.complex(2*x + 1), Q.imaginary(x)) is True + assert ask(Q.complex(2*x + 1), Q.integer(x)) is True + assert ask(Q.complex(2*x + 1), Q.even(x)) is True + assert ask(Q.complex(2*x + 1), Q.odd(x)) is True + + # x**2 + assert ask(Q.complex(x**2), Q.complex(x)) is True + assert ask(Q.complex(x**2), Q.real(x)) is True + assert ask(Q.complex(x**2), Q.positive(x)) is True + assert ask(Q.complex(x**2), Q.rational(x)) is True + assert ask(Q.complex(x**2), Q.irrational(x)) is True + assert ask(Q.complex(x**2), Q.imaginary(x)) is True + assert ask(Q.complex(x**2), Q.integer(x)) is True + assert ask(Q.complex(x**2), Q.even(x)) is True + assert ask(Q.complex(x**2), Q.odd(x)) is True + + # 2**x + assert ask(Q.complex(2**x), Q.complex(x)) is True + assert ask(Q.complex(2**x), Q.real(x)) is True + assert ask(Q.complex(2**x), Q.positive(x)) is True + assert ask(Q.complex(2**x), Q.rational(x)) is True + assert ask(Q.complex(2**x), Q.irrational(x)) is True + assert ask(Q.complex(2**x), Q.imaginary(x)) is True + assert ask(Q.complex(2**x), Q.integer(x)) is True + assert ask(Q.complex(2**x), Q.even(x)) is True + assert ask(Q.complex(2**x), Q.odd(x)) is True + assert ask(Q.complex(x**y), Q.complex(x) & Q.complex(y)) is True + + # trigonometric expressions + assert ask(Q.complex(sin(x))) is True + assert ask(Q.complex(sin(2*x + 1))) is True + assert ask(Q.complex(cos(x))) is True + assert ask(Q.complex(cos(2*x + 1))) is True + + # exponential + assert ask(Q.complex(exp(x))) is True + assert ask(Q.complex(exp(x))) is True + + # Q.complexes + assert ask(Q.complex(Abs(x))) is True + assert ask(Q.complex(re(x))) is True + assert ask(Q.complex(im(x))) is True + + +def test_even_query(): + assert ask(Q.even(x)) is None + assert ask(Q.even(x), Q.integer(x)) is None + assert ask(Q.even(x), ~Q.integer(x)) is False + assert ask(Q.even(x), Q.rational(x)) is None + assert ask(Q.even(x), Q.positive(x)) is None + + assert ask(Q.even(2*x)) is None + assert ask(Q.even(2*x), Q.integer(x)) is True + assert ask(Q.even(2*x), Q.even(x)) is True + assert ask(Q.even(2*x), Q.irrational(x)) is False + assert ask(Q.even(2*x), Q.odd(x)) is True + assert ask(Q.even(2*x), ~Q.integer(x)) is None + assert ask(Q.even(3*x), Q.integer(x)) is None + assert ask(Q.even(3*x), Q.even(x)) is True + assert ask(Q.even(3*x), Q.odd(x)) is False + + assert ask(Q.even(x + 1), Q.odd(x)) is True + assert ask(Q.even(x + 1), Q.even(x)) is False + assert ask(Q.even(x + 2), Q.odd(x)) is False + assert ask(Q.even(x + 2), Q.even(x)) is True + assert ask(Q.even(7 - x), Q.odd(x)) is True + assert ask(Q.even(7 + x), Q.odd(x)) is True + assert ask(Q.even(x + y), Q.odd(x) & Q.odd(y)) is True + assert ask(Q.even(x + y), Q.odd(x) & Q.even(y)) is False + assert ask(Q.even(x + y), Q.even(x) & Q.even(y)) is True + + assert ask(Q.even(2*x + 1), Q.integer(x)) is False + assert ask(Q.even(2*x*y), Q.rational(x) & Q.rational(x)) is None + assert ask(Q.even(2*x*y), Q.irrational(x) & Q.irrational(x)) is None + + assert ask(Q.even(x + y + z), Q.odd(x) & Q.odd(y) & Q.even(z)) is True + assert ask(Q.even(x + y + z + t), + Q.odd(x) & Q.odd(y) & Q.even(z) & Q.integer(t)) is None + + assert ask(Q.even(Abs(x)), Q.even(x)) is True + assert ask(Q.even(Abs(x)), ~Q.even(x)) is None + assert ask(Q.even(re(x)), Q.even(x)) is True + assert ask(Q.even(re(x)), ~Q.even(x)) is None + assert ask(Q.even(im(x)), Q.even(x)) is True + assert ask(Q.even(im(x)), Q.real(x)) is True + + assert ask(Q.even((-1)**n), Q.integer(n)) is False + + assert ask(Q.even(k**2), Q.even(k)) is True + assert ask(Q.even(n**2), Q.odd(n)) is False + assert ask(Q.even(2**k), Q.even(k)) is None + assert ask(Q.even(x**2)) is None + + assert ask(Q.even(k**m), Q.even(k) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.even(n**m), Q.odd(n) & Q.integer(m) & ~Q.negative(m)) is False + + assert ask(Q.even(k**p), Q.even(k) & Q.integer(p) & Q.positive(p)) is True + assert ask(Q.even(n**p), Q.odd(n) & Q.integer(p) & Q.positive(p)) is False + + assert ask(Q.even(m**k), Q.even(k) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.even(p**k), Q.even(k) & Q.integer(p) & Q.positive(p)) is None + + assert ask(Q.even(m**n), Q.odd(n) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.even(p**n), Q.odd(n) & Q.integer(p) & Q.positive(p)) is None + + assert ask(Q.even(k**x), Q.even(k)) is None + assert ask(Q.even(n**x), Q.odd(n)) is None + + assert ask(Q.even(x*y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.even(x*x), Q.integer(x)) is None + assert ask(Q.even(x*(x + y)), Q.integer(x) & Q.odd(y)) is True + assert ask(Q.even(x*(x + y)), Q.integer(x) & Q.even(y)) is None + + +@XFAIL +def test_evenness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + assert ask(Q.even(x*y*(y + z)), Q.integer(x) & Q.integer(y) & Q.odd(z)) is True + assert ask(Q.even(y*x*(x + z)), Q.integer(x) & Q.integer(y) & Q.odd(z)) is True + + +def test_evenness_in_ternary_integer_product_with_even(): + assert ask(Q.even(x*y*(y + z)), Q.integer(x) & Q.integer(y) & Q.even(z)) is None + + +def test_extended_real(): + assert ask(Q.extended_real(x), Q.positive_infinite(x)) is True + assert ask(Q.extended_real(x), Q.positive(x)) is True + assert ask(Q.extended_real(x), Q.zero(x)) is True + assert ask(Q.extended_real(x), Q.negative(x)) is True + assert ask(Q.extended_real(x), Q.negative_infinite(x)) is True + + assert ask(Q.extended_real(-x), Q.positive(x)) is True + assert ask(Q.extended_real(-x), Q.negative(x)) is True + + assert ask(Q.extended_real(x + S.Infinity), Q.real(x)) is True + + assert ask(Q.extended_real(x), Q.infinite(x)) is None + + +@_both_exp_pow +def test_rational(): + assert ask(Q.rational(x), Q.integer(x)) is True + assert ask(Q.rational(x), Q.irrational(x)) is False + assert ask(Q.rational(x), Q.real(x)) is None + assert ask(Q.rational(x), Q.positive(x)) is None + assert ask(Q.rational(x), Q.negative(x)) is None + assert ask(Q.rational(x), Q.nonzero(x)) is None + assert ask(Q.rational(x), ~Q.algebraic(x)) is False + + assert ask(Q.rational(2*x), Q.rational(x)) is True + assert ask(Q.rational(2*x), Q.integer(x)) is True + assert ask(Q.rational(2*x), Q.even(x)) is True + assert ask(Q.rational(2*x), Q.odd(x)) is True + assert ask(Q.rational(2*x), Q.irrational(x)) is False + + assert ask(Q.rational(x/2), Q.rational(x)) is True + assert ask(Q.rational(x/2), Q.integer(x)) is True + assert ask(Q.rational(x/2), Q.even(x)) is True + assert ask(Q.rational(x/2), Q.odd(x)) is True + assert ask(Q.rational(x/2), Q.irrational(x)) is False + + assert ask(Q.rational(1/x), Q.rational(x) & Q.nonzero(x)) is True + assert ask(Q.rational(1/x), Q.integer(x) & Q.nonzero(x)) is True + assert ask(Q.rational(1/x), Q.even(x) & Q.nonzero(x)) is True + assert ask(Q.rational(1/x), Q.odd(x)) is True + assert ask(Q.rational(1/x), Q.irrational(x)) is False + + assert ask(Q.rational(2/x), Q.rational(x) & Q.nonzero(x)) is True + assert ask(Q.rational(2/x), Q.integer(x) & Q.nonzero(x)) is True + assert ask(Q.rational(2/x), Q.even(x) & Q.nonzero(x)) is True + assert ask(Q.rational(2/x), Q.odd(x)) is True + assert ask(Q.rational(2/x), Q.irrational(x)) is False + + assert ask(Q.rational(x), ~Q.algebraic(x)) is False + + # with multiple symbols + assert ask(Q.rational(x*y), Q.irrational(x) & Q.irrational(y)) is None + assert ask(Q.rational(y/x), Q.rational(x) & Q.rational(y) & Q.nonzero(x)) is True + assert ask(Q.rational(y/x), Q.integer(x) & Q.rational(y) & Q.nonzero(x)) is True + assert ask(Q.rational(y/x), Q.even(x) & Q.rational(y) & Q.nonzero(x)) is True + assert ask(Q.rational(y/x), Q.odd(x) & Q.rational(y)) is True + assert ask(Q.rational(y/x), Q.irrational(x) & Q.rational(y) & Q.nonzero(y)) is False + + for f in [exp, sin, tan, asin, atan, cos]: + assert ask(Q.rational(f(7))) is False + assert ask(Q.rational(f(7, evaluate=False))) is False + assert ask(Q.rational(f(0, evaluate=False))) is True + assert ask(Q.rational(f(x)), Q.rational(x)) is None + assert ask(Q.rational(f(x)), Q.rational(x) & Q.nonzero(x)) is False + + for g in [log, acos]: + assert ask(Q.rational(g(7))) is False + assert ask(Q.rational(g(7, evaluate=False))) is False + assert ask(Q.rational(g(1, evaluate=False))) is True + assert ask(Q.rational(g(x)), Q.rational(x)) is None + assert ask(Q.rational(g(x)), Q.rational(x) & Q.nonzero(x - 1)) is False + + for h in [cot, acot]: + assert ask(Q.rational(h(7))) is False + assert ask(Q.rational(h(7, evaluate=False))) is False + assert ask(Q.rational(h(x)), Q.rational(x)) is False + + # https://github.com/sympy/sympy/issues/27442 + assert ask(Q.rational(x**y),Q.irrational(x) & Q.rational(y)) is None + assert ask(Q.rational(x**y),Q.integer(x) & Q.prime(x) & Q.rational(y)) is None + assert ask(Q.rational(x**y),Q.integer(x) & Q.integer(y)) is None + assert ask(Q.rational(x**y),Q.integer(x) & Q.eq(x,0) & Q.integer(y)) is None + assert ask(Q.rational(x**y),Q.eq(x,1) & Q.rational(y)) is None + assert ask(Q.rational(x**y),Q.eq(x,-1) & Q.rational(y)) is None + assert ask(Q.rational(x**y), Q.prime(x) & Q.rational(y)) is None + assert ask(Q.rational(x**y), ~Q.rational(x) & Q.integer(y) ) is None + assert ask(Q.rational(Pow(-1, x, evaluate=False), Q.rational(x))) is None + assert ask(Q.rational(x**y), Q.integer(y) & ~Q. algebraic(x)) is None + assert ask(Q.rational(x**y), Q.integer(y) & ~Q. algebraic(x) & ~Q.zero(x)) is None + assert ask(Q.rational(x**y), Q.integer(y) & ~Q.algebraic(x) & Q.complex(x) & ~Q.real(x)) is None + assert ask(Q.rational(x**y), Q.integer(y) & ~Q.algebraic(x) & Q.complex(x)) is None + + +def test_hermitian(): + assert ask(Q.hermitian(x)) is None + assert ask(Q.hermitian(x), Q.antihermitian(x)) is None + assert ask(Q.hermitian(x), Q.imaginary(x)) is False + assert ask(Q.hermitian(x), Q.prime(x)) is True + assert ask(Q.hermitian(x), Q.real(x)) is True + assert ask(Q.hermitian(x), Q.zero(x)) is True + + assert ask(Q.hermitian(x + 1), Q.antihermitian(x)) is None + assert ask(Q.hermitian(x + 1), Q.complex(x)) is None + assert ask(Q.hermitian(x + 1), Q.hermitian(x)) is True + assert ask(Q.hermitian(x + 1), Q.imaginary(x)) is False + assert ask(Q.hermitian(x + 1), Q.real(x)) is True + assert ask(Q.hermitian(x + I), Q.antihermitian(x)) is None + assert ask(Q.hermitian(x + I), Q.complex(x)) is None + assert ask(Q.hermitian(x + I), Q.hermitian(x)) is False + assert ask(Q.hermitian(x + I), Q.imaginary(x)) is None + assert ask(Q.hermitian(x + I), Q.real(x)) is False + assert ask( + Q.hermitian(x + y), Q.antihermitian(x) & Q.antihermitian(y)) is None + assert ask(Q.hermitian(x + y), Q.antihermitian(x) & Q.complex(y)) is None + assert ask( + Q.hermitian(x + y), Q.antihermitian(x) & Q.hermitian(y)) is None + assert ask(Q.hermitian(x + y), Q.antihermitian(x) & Q.imaginary(y)) is None + assert ask(Q.hermitian(x + y), Q.antihermitian(x) & Q.real(y)) is None + assert ask(Q.hermitian(x + y), Q.hermitian(x) & Q.complex(y)) is None + assert ask(Q.hermitian(x + y), Q.hermitian(x) & Q.hermitian(y)) is True + assert ask(Q.hermitian(x + y), Q.hermitian(x) & Q.imaginary(y)) is False + assert ask(Q.hermitian(x + y), Q.hermitian(x) & Q.real(y)) is True + assert ask(Q.hermitian(x + y), Q.imaginary(x) & Q.complex(y)) is None + assert ask(Q.hermitian(x + y), Q.imaginary(x) & Q.imaginary(y)) is None + assert ask(Q.hermitian(x + y), Q.imaginary(x) & Q.real(y)) is False + assert ask(Q.hermitian(x + y), Q.real(x) & Q.complex(y)) is None + assert ask(Q.hermitian(x + y), Q.real(x) & Q.real(y)) is True + + assert ask(Q.hermitian(I*x), Q.antihermitian(x)) is True + assert ask(Q.hermitian(I*x), Q.complex(x)) is None + assert ask(Q.hermitian(I*x), Q.hermitian(x)) is False + assert ask(Q.hermitian(I*x), Q.imaginary(x)) is True + assert ask(Q.hermitian(I*x), Q.real(x)) is False + assert ask(Q.hermitian(x*y), Q.hermitian(x) & Q.real(y)) is True + + assert ask( + Q.hermitian(x + y + z), Q.real(x) & Q.real(y) & Q.real(z)) is True + assert ask(Q.hermitian(x + y + z), + Q.real(x) & Q.real(y) & Q.imaginary(z)) is False + assert ask(Q.hermitian(x + y + z), + Q.real(x) & Q.imaginary(y) & Q.imaginary(z)) is None + assert ask(Q.hermitian(x + y + z), + Q.imaginary(x) & Q.imaginary(y) & Q.imaginary(z)) is None + + assert ask(Q.antihermitian(x)) is None + assert ask(Q.antihermitian(x), Q.real(x)) is False + assert ask(Q.antihermitian(x), Q.prime(x)) is False + + assert ask(Q.antihermitian(x + 1), Q.antihermitian(x)) is False + assert ask(Q.antihermitian(x + 1), Q.complex(x)) is None + assert ask(Q.antihermitian(x + 1), Q.hermitian(x)) is None + assert ask(Q.antihermitian(x + 1), Q.imaginary(x)) is False + assert ask(Q.antihermitian(x + 1), Q.real(x)) is None + assert ask(Q.antihermitian(x + I), Q.antihermitian(x)) is True + assert ask(Q.antihermitian(x + I), Q.complex(x)) is None + assert ask(Q.antihermitian(x + I), Q.hermitian(x)) is None + assert ask(Q.antihermitian(x + I), Q.imaginary(x)) is True + assert ask(Q.antihermitian(x + I), Q.real(x)) is False + assert ask(Q.antihermitian(x), Q.zero(x)) is True + + assert ask( + Q.antihermitian(x + y), Q.antihermitian(x) & Q.antihermitian(y) + ) is True + assert ask( + Q.antihermitian(x + y), Q.antihermitian(x) & Q.complex(y)) is None + assert ask( + Q.antihermitian(x + y), Q.antihermitian(x) & Q.hermitian(y)) is None + assert ask( + Q.antihermitian(x + y), Q.antihermitian(x) & Q.imaginary(y)) is True + assert ask(Q.antihermitian(x + y), Q.antihermitian(x) & Q.real(y) + ) is False + assert ask(Q.antihermitian(x + y), Q.hermitian(x) & Q.complex(y)) is None + assert ask(Q.antihermitian(x + y), Q.hermitian(x) & Q.hermitian(y) + ) is None + assert ask( + Q.antihermitian(x + y), Q.hermitian(x) & Q.imaginary(y)) is None + assert ask(Q.antihermitian(x + y), Q.hermitian(x) & Q.real(y)) is None + assert ask(Q.antihermitian(x + y), Q.imaginary(x) & Q.complex(y)) is None + assert ask(Q.antihermitian(x + y), Q.imaginary(x) & Q.imaginary(y)) is True + assert ask(Q.antihermitian(x + y), Q.imaginary(x) & Q.real(y)) is False + assert ask(Q.antihermitian(x + y), Q.real(x) & Q.complex(y)) is None + assert ask(Q.antihermitian(x + y), Q.real(x) & Q.real(y)) is None + + assert ask(Q.antihermitian(I*x), Q.real(x)) is True + assert ask(Q.antihermitian(I*x), Q.antihermitian(x)) is False + assert ask(Q.antihermitian(I*x), Q.complex(x)) is None + assert ask(Q.antihermitian(x*y), Q.antihermitian(x) & Q.real(y)) is True + + assert ask(Q.antihermitian(x + y + z), + Q.real(x) & Q.real(y) & Q.real(z)) is None + assert ask(Q.antihermitian(x + y + z), + Q.real(x) & Q.real(y) & Q.imaginary(z)) is None + assert ask(Q.antihermitian(x + y + z), + Q.real(x) & Q.imaginary(y) & Q.imaginary(z)) is False + assert ask(Q.antihermitian(x + y + z), + Q.imaginary(x) & Q.imaginary(y) & Q.imaginary(z)) is True + + +@_both_exp_pow +def test_imaginary(): + assert ask(Q.imaginary(x)) is None + assert ask(Q.imaginary(x), Q.real(x)) is False + assert ask(Q.imaginary(x), Q.prime(x)) is False + + assert ask(Q.imaginary(x + 1), Q.real(x)) is False + assert ask(Q.imaginary(x + 1), Q.imaginary(x)) is False + assert ask(Q.imaginary(x + I), Q.real(x)) is False + assert ask(Q.imaginary(x + I), Q.imaginary(x)) is True + assert ask(Q.imaginary(x + y), Q.imaginary(x) & Q.imaginary(y)) is True + assert ask(Q.imaginary(x + y), Q.real(x) & Q.real(y)) is False + assert ask(Q.imaginary(x + y), Q.imaginary(x) & Q.real(y)) is False + assert ask(Q.imaginary(x + y), Q.complex(x) & Q.real(y)) is None + assert ask( + Q.imaginary(x + y + z), Q.real(x) & Q.real(y) & Q.real(z)) is False + assert ask(Q.imaginary(x + y + z), + Q.real(x) & Q.real(y) & Q.imaginary(z)) is None + assert ask(Q.imaginary(x + y + z), + Q.real(x) & Q.imaginary(y) & Q.imaginary(z)) is False + + assert ask(Q.imaginary(I*x), Q.real(x)) is True + assert ask(Q.imaginary(I*x), Q.imaginary(x)) is False + assert ask(Q.imaginary(I*x), Q.complex(x)) is None + assert ask(Q.imaginary(x*y), Q.imaginary(x) & Q.real(y)) is True + assert ask(Q.imaginary(x*y), Q.real(x) & Q.real(y)) is False + + assert ask(Q.imaginary(I**x), Q.negative(x)) is None + assert ask(Q.imaginary(I**x), Q.positive(x)) is None + assert ask(Q.imaginary(I**x), Q.even(x)) is False + assert ask(Q.imaginary(I**x), Q.odd(x)) is True + assert ask(Q.imaginary(I**x), Q.imaginary(x)) is False + assert ask(Q.imaginary((2*I)**x), Q.imaginary(x)) is False + assert ask(Q.imaginary(x**0), Q.imaginary(x)) is False + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.imaginary(y)) is None + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.real(y)) is None + assert ask(Q.imaginary(x**y), Q.real(x) & Q.imaginary(y)) is None + assert ask(Q.imaginary(x**y), Q.real(x) & Q.real(y)) is None + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.integer(y)) is None + assert ask(Q.imaginary(x**y), Q.imaginary(y) & Q.integer(x)) is None + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.odd(y)) is True + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.rational(y)) is None + assert ask(Q.imaginary(x**y), Q.imaginary(x) & Q.even(y)) is False + + assert ask(Q.imaginary(x**y), Q.real(x) & Q.integer(y)) is False + assert ask(Q.imaginary(x**y), Q.positive(x) & Q.real(y)) is False + assert ask(Q.imaginary(x**y), Q.negative(x) & Q.real(y)) is None + assert ask(Q.imaginary(x**y), Q.negative(x) & Q.real(y) & ~Q.rational(y)) is False + assert ask(Q.imaginary(x**y), Q.integer(x) & Q.imaginary(y)) is None + assert ask(Q.imaginary(x**y), Q.negative(x) & Q.rational(y) & Q.integer(2*y)) is True + assert ask(Q.imaginary(x**y), Q.negative(x) & Q.rational(y) & ~Q.integer(2*y)) is False + assert ask(Q.imaginary(x**y), Q.negative(x) & Q.rational(y)) is None + assert ask(Q.imaginary(x**y), Q.real(x) & Q.rational(y) & ~Q.integer(2*y)) is False + assert ask(Q.imaginary(x**y), Q.real(x) & Q.rational(y) & Q.integer(2*y)) is None + + # logarithm + assert ask(Q.imaginary(log(I))) is True + assert ask(Q.imaginary(log(2*I))) is False + assert ask(Q.imaginary(log(I + 1))) is False + assert ask(Q.imaginary(log(x)), Q.complex(x)) is None + assert ask(Q.imaginary(log(x)), Q.imaginary(x)) is None + assert ask(Q.imaginary(log(x)), Q.positive(x)) is False + assert ask(Q.imaginary(log(exp(x))), Q.complex(x)) is None + assert ask(Q.imaginary(log(exp(x))), Q.imaginary(x)) is None # zoo/I/a+I*b + assert ask(Q.imaginary(log(exp(I)))) is True + + # exponential + assert ask(Q.imaginary(exp(x)**x), Q.imaginary(x)) is False + eq = Pow(exp(pi*I*x, evaluate=False), x, evaluate=False) + assert ask(Q.imaginary(eq), Q.even(x)) is False + eq = Pow(exp(pi*I*x/2, evaluate=False), x, evaluate=False) + assert ask(Q.imaginary(eq), Q.odd(x)) is True + assert ask(Q.imaginary(exp(3*I*pi*x)**x), Q.integer(x)) is False + assert ask(Q.imaginary(exp(2*pi*I, evaluate=False))) is False + assert ask(Q.imaginary(exp(pi*I/2, evaluate=False))) is True + + # issue 7886 + assert ask(Q.imaginary(Pow(x, Rational(1, 4))), Q.real(x) & Q.negative(x)) is False + + +def test_integer(): + assert ask(Q.integer(x)) is None + assert ask(Q.integer(x), Q.integer(x)) is True + assert ask(Q.integer(x), ~Q.integer(x)) is False + assert ask(Q.integer(x), ~Q.real(x)) is False + assert ask(Q.integer(x), ~Q.positive(x)) is None + assert ask(Q.integer(x), Q.even(x) | Q.odd(x)) is True + + assert ask(Q.integer(2*x), Q.integer(x)) is True + assert ask(Q.integer(2*x), Q.even(x)) is True + assert ask(Q.integer(2*x), Q.prime(x)) is True + assert ask(Q.integer(2*x), Q.rational(x)) is None + assert ask(Q.integer(2*x), Q.real(x)) is None + assert ask(Q.integer(sqrt(2)*x), Q.integer(x)) is False + assert ask(Q.integer(sqrt(2)*x), Q.irrational(x)) is None + + assert ask(Q.integer(x/2), Q.odd(x)) is False + assert ask(Q.integer(x/2), Q.even(x)) is True + assert ask(Q.integer(x/3), Q.odd(x)) is None + assert ask(Q.integer(x/3), Q.even(x)) is None + + # https://github.com/sympy/sympy/issues/7286 + assert ask(Q.integer(Abs(x)),Q.integer(x)) is True + assert ask(Q.integer(Abs(-x)),Q.integer(x)) is True + assert ask(Q.integer(Abs(x)), ~Q.integer(x)) is None + assert ask(Q.integer(Abs(x)),Q.complex(x)) is None + assert ask(Q.integer(Abs(x+I*y)),Q.real(x) & Q.real(y)) is None + + # https://github.com/sympy/sympy/issues/27739 + assert ask(Q.integer(x/y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.integer(1/x), Q.integer(x)) is None + assert ask(Q.integer(x**y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.integer(sqrt(5))) is False + assert ask(Q.integer(x**y), Q.nonzero(x) & Q.zero(y)) is True + assert ask(Q.integer(x**y), Q.integer(x) & Q.integer(y) & Q.positive(y)) is True + assert ask(Q.integer(-1**x), Q.integer(x)) is True + assert ask(Q.integer(x**y), Q.integer(x) & Q.integer(y) & Q.positive(y)) is True + assert ask(Q.integer(x**y), Q.zero(x) & Q.integer(y) & Q.positive(y)) is True + assert ask(Q.integer(pi**x), Q.zero(x)) is True + assert ask(Q.integer(x**y), Q.imaginary(x) & Q.zero(y)) is True + + +def test_negative(): + assert ask(Q.negative(x), Q.negative(x)) is True + assert ask(Q.negative(x), Q.positive(x)) is False + assert ask(Q.negative(x), ~Q.real(x)) is False + assert ask(Q.negative(x), Q.prime(x)) is False + assert ask(Q.negative(x), ~Q.prime(x)) is None + + assert ask(Q.negative(-x), Q.positive(x)) is True + assert ask(Q.negative(-x), ~Q.positive(x)) is None + assert ask(Q.negative(-x), Q.negative(x)) is False + assert ask(Q.negative(-x), Q.positive(x)) is True + + assert ask(Q.negative(x - 1), Q.negative(x)) is True + assert ask(Q.negative(x + y)) is None + assert ask(Q.negative(x + y), Q.negative(x)) is None + assert ask(Q.negative(x + y), Q.negative(x) & Q.negative(y)) is True + assert ask(Q.negative(x + y), Q.negative(x) & Q.nonpositive(y)) is True + assert ask(Q.negative(2 + I)) is False + # although this could be False, it is representative of expressions + # that don't evaluate to a zero with precision + assert ask(Q.negative(cos(I)**2 + sin(I)**2 - 1)) is None + assert ask(Q.negative(-I + I*(cos(2)**2 + sin(2)**2))) is None + + assert ask(Q.negative(x**2)) is None + assert ask(Q.negative(x**2), Q.real(x)) is False + assert ask(Q.negative(x**1.4), Q.real(x)) is None + + assert ask(Q.negative(x**I), Q.positive(x)) is None + + assert ask(Q.negative(x*y)) is None + assert ask(Q.negative(x*y), Q.positive(x) & Q.positive(y)) is False + assert ask(Q.negative(x*y), Q.positive(x) & Q.negative(y)) is True + assert ask(Q.negative(x*y), Q.complex(x) & Q.complex(y)) is None + + assert ask(Q.negative(x**y)) is None + assert ask(Q.negative(x**y), Q.negative(x) & Q.even(y)) is False + assert ask(Q.negative(x**y), Q.negative(x) & Q.odd(y)) is True + assert ask(Q.negative(x**y), Q.positive(x) & Q.integer(y)) is False + + assert ask(Q.negative(Abs(x))) is False + + +def test_nonzero(): + assert ask(Q.nonzero(x)) is None + assert ask(Q.nonzero(x), Q.real(x)) is None + assert ask(Q.nonzero(x), Q.positive(x)) is True + assert ask(Q.nonzero(x), Q.negative(x)) is True + assert ask(Q.nonzero(x), Q.negative(x) | Q.positive(x)) is True + + assert ask(Q.nonzero(x + y)) is None + assert ask(Q.nonzero(x + y), Q.positive(x) & Q.positive(y)) is True + assert ask(Q.nonzero(x + y), Q.positive(x) & Q.negative(y)) is None + assert ask(Q.nonzero(x + y), Q.negative(x) & Q.negative(y)) is True + + assert ask(Q.nonzero(2*x)) is None + assert ask(Q.nonzero(2*x), Q.positive(x)) is True + assert ask(Q.nonzero(2*x), Q.negative(x)) is True + assert ask(Q.nonzero(x*y), Q.nonzero(x)) is None + assert ask(Q.nonzero(x*y), Q.nonzero(x) & Q.nonzero(y)) is True + + assert ask(Q.nonzero(x**y), Q.nonzero(x)) is True + + assert ask(Q.nonzero(Abs(x))) is None + assert ask(Q.nonzero(Abs(x)), Q.nonzero(x)) is True + + assert ask(Q.nonzero(log(exp(2*I)))) is False + # although this could be False, it is representative of expressions + # that don't evaluate to a zero with precision + assert ask(Q.nonzero(cos(1)**2 + sin(1)**2 - 1)) is None + + +def test_zero(): + assert ask(Q.zero(x)) is None + assert ask(Q.zero(x), Q.real(x)) is None + assert ask(Q.zero(x), Q.positive(x)) is False + assert ask(Q.zero(x), Q.negative(x)) is False + assert ask(Q.zero(x), Q.negative(x) | Q.positive(x)) is False + + assert ask(Q.zero(x), Q.nonnegative(x) & Q.nonpositive(x)) is True + + assert ask(Q.zero(x + y)) is None + assert ask(Q.zero(x + y), Q.positive(x) & Q.positive(y)) is False + assert ask(Q.zero(x + y), Q.positive(x) & Q.negative(y)) is None + assert ask(Q.zero(x + y), Q.negative(x) & Q.negative(y)) is False + + assert ask(Q.zero(2*x)) is None + assert ask(Q.zero(2*x), Q.positive(x)) is False + assert ask(Q.zero(2*x), Q.negative(x)) is False + assert ask(Q.zero(x*y), Q.nonzero(x)) is None + + assert ask(Q.zero(Abs(x))) is None + assert ask(Q.zero(Abs(x)), Q.zero(x)) is True + + assert ask(Q.integer(x), Q.zero(x)) is True + assert ask(Q.even(x), Q.zero(x)) is True + assert ask(Q.odd(x), Q.zero(x)) is False + assert ask(Q.zero(x), Q.even(x)) is None + assert ask(Q.zero(x), Q.odd(x)) is False + assert ask(Q.zero(x) | Q.zero(y), Q.zero(x*y)) is True + + +def test_odd_query(): + assert ask(Q.odd(x)) is None + assert ask(Q.odd(x), Q.odd(x)) is True + assert ask(Q.odd(x), Q.integer(x)) is None + assert ask(Q.odd(x), ~Q.integer(x)) is False + assert ask(Q.odd(x), Q.rational(x)) is None + assert ask(Q.odd(x), Q.positive(x)) is None + + assert ask(Q.odd(-x), Q.odd(x)) is True + + assert ask(Q.odd(2*x)) is None + assert ask(Q.odd(2*x), Q.integer(x)) is False + assert ask(Q.odd(2*x), Q.odd(x)) is False + assert ask(Q.odd(2*x), Q.irrational(x)) is False + assert ask(Q.odd(2*x), ~Q.integer(x)) is None + assert ask(Q.odd(3*x), Q.integer(x)) is None + + assert ask(Q.odd(x/3), Q.odd(x)) is None + assert ask(Q.odd(x/3), Q.even(x)) is None + + assert ask(Q.odd(x + 1), Q.even(x)) is True + assert ask(Q.odd(x + 2), Q.even(x)) is False + assert ask(Q.odd(x + 2), Q.odd(x)) is True + assert ask(Q.odd(3 - x), Q.odd(x)) is False + assert ask(Q.odd(3 - x), Q.even(x)) is True + assert ask(Q.odd(3 + x), Q.odd(x)) is False + assert ask(Q.odd(3 + x), Q.even(x)) is True + assert ask(Q.odd(x + y), Q.odd(x) & Q.odd(y)) is False + assert ask(Q.odd(x + y), Q.odd(x) & Q.even(y)) is True + assert ask(Q.odd(x - y), Q.even(x) & Q.odd(y)) is True + assert ask(Q.odd(x - y), Q.odd(x) & Q.odd(y)) is False + + assert ask(Q.odd(x + y + z), Q.odd(x) & Q.odd(y) & Q.even(z)) is False + assert ask(Q.odd(x + y + z + t), + Q.odd(x) & Q.odd(y) & Q.even(z) & Q.integer(t)) is None + + assert ask(Q.odd(2*x + 1), Q.integer(x)) is True + assert ask(Q.odd(2*x + y), Q.integer(x) & Q.odd(y)) is True + assert ask(Q.odd(2*x + y), Q.integer(x) & Q.even(y)) is False + assert ask(Q.odd(2*x + y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.odd(x*y), Q.odd(x) & Q.even(y)) is False + assert ask(Q.odd(x*y), Q.odd(x) & Q.odd(y)) is True + assert ask(Q.odd(2*x*y), Q.rational(x) & Q.rational(x)) is None + assert ask(Q.odd(2*x*y), Q.irrational(x) & Q.irrational(x)) is None + + assert ask(Q.odd(Abs(x)), Q.odd(x)) is True + + assert ask(Q.odd((-1)**n), Q.integer(n)) is True + + assert ask(Q.odd(k**2), Q.even(k)) is False + assert ask(Q.odd(n**2), Q.odd(n)) is True + assert ask(Q.odd(3**k), Q.even(k)) is None + + assert ask(Q.odd(k**m), Q.even(k) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.odd(n**m), Q.odd(n) & Q.integer(m) & ~Q.negative(m)) is True + + assert ask(Q.odd(k**p), Q.even(k) & Q.integer(p) & Q.positive(p)) is False + assert ask(Q.odd(n**p), Q.odd(n) & Q.integer(p) & Q.positive(p)) is True + + assert ask(Q.odd(m**k), Q.even(k) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.odd(p**k), Q.even(k) & Q.integer(p) & Q.positive(p)) is None + + assert ask(Q.odd(m**n), Q.odd(n) & Q.integer(m) & ~Q.negative(m)) is None + assert ask(Q.odd(p**n), Q.odd(n) & Q.integer(p) & Q.positive(p)) is None + + assert ask(Q.odd(k**x), Q.even(k)) is None + assert ask(Q.odd(n**x), Q.odd(n)) is None + + assert ask(Q.odd(x*y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.odd(x*x), Q.integer(x)) is None + assert ask(Q.odd(x*(x + y)), Q.integer(x) & Q.odd(y)) is False + assert ask(Q.odd(x*(x + y)), Q.integer(x) & Q.even(y)) is None + + +@XFAIL +def test_oddness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + assert ask(Q.odd(x*y*(y + z)), Q.integer(x) & Q.integer(y) & Q.odd(z)) is False + assert ask(Q.odd(y*x*(x + z)), Q.integer(x) & Q.integer(y) & Q.odd(z)) is False + + +def test_oddness_in_ternary_integer_product_with_even(): + assert ask(Q.odd(x*y*(y + z)), Q.integer(x) & Q.integer(y) & Q.even(z)) is None + + +def test_prime(): + assert ask(Q.prime(x), Q.prime(x)) is True + assert ask(Q.prime(x), ~Q.prime(x)) is False + assert ask(Q.prime(x), Q.integer(x)) is None + assert ask(Q.prime(x), ~Q.integer(x)) is False + + assert ask(Q.prime(2*x), Q.integer(x)) is None + assert ask(Q.prime(x*y)) is None + assert ask(Q.prime(x*y), Q.prime(x)) is None + assert ask(Q.prime(x*y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.prime(4*x), Q.integer(x)) is False + assert ask(Q.prime(4*x)) is None + + assert ask(Q.prime(x**2), Q.integer(x)) is False + assert ask(Q.prime(x**2), Q.prime(x)) is False + + # https://github.com/sympy/sympy/issues/27446 + assert ask(Q.prime(4**x), Q.integer(x)) is False + assert ask(Q.prime(p**x), Q.prime(p) & Q.integer(x) & Q.ne(x, 1)) is False + assert ask(Q.prime(n**x), Q.integer(x) & Q.composite(n)) is False + assert ask(Q.prime(x**y), Q.integer(x) & Q.integer(y)) is None + assert ask(Q.prime(2**x), Q.integer(x)) is None + assert ask(Q.prime(p**x), Q.prime(p) & Q.integer(x)) is None + + # Ideally, these should return True since the base is prime and the exponent is one, + # but currently, they return None. + assert ask(Q.prime(x**y), Q.prime(x) & Q.eq(y,1)) is None + assert ask(Q.prime(x**y), Q.prime(x) & Q.integer(y) & Q.gt(y,0) & Q.lt(y,2)) is None + + assert ask(Q.prime(Pow(x,1, evaluate=False)), Q.prime(x)) is True + + +@_both_exp_pow +def test_positive(): + assert ask(Q.positive(cos(I) ** 2 + sin(I) ** 2 - 1)) is None + assert ask(Q.positive(x), Q.positive(x)) is True + assert ask(Q.positive(x), Q.negative(x)) is False + assert ask(Q.positive(x), Q.nonzero(x)) is None + + assert ask(Q.positive(-x), Q.positive(x)) is False + assert ask(Q.positive(-x), Q.negative(x)) is True + + assert ask(Q.positive(x + y), Q.positive(x) & Q.positive(y)) is True + assert ask(Q.positive(x + y), Q.positive(x) & Q.nonnegative(y)) is True + assert ask(Q.positive(x + y), Q.positive(x) & Q.negative(y)) is None + assert ask(Q.positive(x + y), Q.positive(x) & Q.imaginary(y)) is False + + assert ask(Q.positive(2*x), Q.positive(x)) is True + assumptions = Q.positive(x) & Q.negative(y) & Q.negative(z) & Q.positive(w) + assert ask(Q.positive(x*y*z)) is None + assert ask(Q.positive(x*y*z), assumptions) is True + assert ask(Q.positive(-x*y*z), assumptions) is False + + assert ask(Q.positive(x**I), Q.positive(x)) is None + + assert ask(Q.positive(x**2), Q.positive(x)) is True + assert ask(Q.positive(x**2), Q.negative(x)) is True + assert ask(Q.positive(x**3), Q.negative(x)) is False + assert ask(Q.positive(1/(1 + x**2)), Q.real(x)) is True + assert ask(Q.positive(2**I)) is False + assert ask(Q.positive(2 + I)) is False + # although this could be False, it is representative of expressions + # that don't evaluate to a zero with precision + assert ask(Q.positive(cos(I)**2 + sin(I)**2 - 1)) is None + assert ask(Q.positive(-I + I*(cos(2)**2 + sin(2)**2))) is None + + #exponential + assert ask(Q.positive(exp(x)), Q.real(x)) is True + assert ask(~Q.negative(exp(x)), Q.real(x)) is True + assert ask(Q.positive(x + exp(x)), Q.real(x)) is None + assert ask(Q.positive(exp(x)), Q.imaginary(x)) is None + assert ask(Q.positive(exp(2*pi*I, evaluate=False)), Q.imaginary(x)) is True + assert ask(Q.negative(exp(pi*I, evaluate=False)), Q.imaginary(x)) is True + assert ask(Q.positive(exp(x*pi*I)), Q.even(x)) is True + assert ask(Q.positive(exp(x*pi*I)), Q.odd(x)) is False + assert ask(Q.positive(exp(x*pi*I)), Q.real(x)) is None + + # logarithm + assert ask(Q.positive(log(x)), Q.imaginary(x)) is False + assert ask(Q.positive(log(x)), Q.negative(x)) is False + assert ask(Q.positive(log(x)), Q.positive(x)) is None + assert ask(Q.positive(log(x + 2)), Q.positive(x)) is True + + # factorial + assert ask(Q.positive(factorial(x)), Q.integer(x) & Q.positive(x)) + assert ask(Q.positive(factorial(x)), Q.integer(x)) is None + + #absolute value + assert ask(Q.positive(Abs(x))) is None # Abs(0) = 0 + assert ask(Q.positive(Abs(x)), Q.positive(x)) is True + + +def test_nonpositive(): + assert ask(Q.nonpositive(-1)) + assert ask(Q.nonpositive(0)) + assert ask(Q.nonpositive(1)) is False + assert ask(~Q.positive(x), Q.nonpositive(x)) + assert ask(Q.nonpositive(x), Q.positive(x)) is False + assert ask(Q.nonpositive(sqrt(-1))) is False + assert ask(Q.nonpositive(x), Q.imaginary(x)) is False + + +def test_nonnegative(): + assert ask(Q.nonnegative(-1)) is False + assert ask(Q.nonnegative(0)) + assert ask(Q.nonnegative(1)) + assert ask(~Q.negative(x), Q.nonnegative(x)) + assert ask(Q.nonnegative(x), Q.negative(x)) is False + assert ask(Q.nonnegative(sqrt(-1))) is False + assert ask(Q.nonnegative(x), Q.imaginary(x)) is False + +def test_real_basic(): + assert ask(Q.real(x)) is None + assert ask(Q.real(x), Q.real(x)) is True + assert ask(Q.real(x), Q.nonzero(x)) is True + assert ask(Q.real(x), Q.positive(x)) is True + assert ask(Q.real(x), Q.negative(x)) is True + assert ask(Q.real(x), Q.integer(x)) is True + assert ask(Q.real(x), Q.even(x)) is True + assert ask(Q.real(x), Q.prime(x)) is True + + assert ask(Q.real(x/sqrt(2)), Q.real(x)) is True + assert ask(Q.real(x/sqrt(-2)), Q.real(x)) is False + + assert ask(Q.real(x + 1), Q.real(x)) is True + assert ask(Q.real(x + I), Q.real(x)) is False + assert ask(Q.real(x + I), Q.complex(x)) is None + + assert ask(Q.real(2*x), Q.real(x)) is True + assert ask(Q.real(I*x), Q.real(x)) is False + assert ask(Q.real(I*x), Q.imaginary(x)) is True + assert ask(Q.real(I*x), Q.complex(x)) is None + + +def test_real_pow(): + assert ask(Q.real(x**2), Q.real(x)) is True + assert ask(Q.real(sqrt(x)), Q.negative(x)) is False + assert ask(Q.real(x**y), Q.real(x) & Q.integer(y)) is None + assert ask(Q.real(x**y), Q.real(x) & Q.real(y)) is None + assert ask(Q.real(x**y), Q.positive(x) & Q.real(y)) is True + assert ask(Q.real(x**y), Q.imaginary(x) & Q.imaginary(y)) is None # I**I or (2*I)**I + assert ask(Q.real(x**y), Q.imaginary(x) & Q.real(y)) is None # I**1 or I**0 + assert ask(Q.real(x**y), Q.real(x) & Q.imaginary(y)) is None # could be exp(2*pi*I) or 2**I + assert ask(Q.real(x**0), Q.imaginary(x)) is True + assert ask(Q.real(x**y), Q.positive(x) & Q.real(y)) is True + assert ask(Q.real(x**y), Q.real(x) & Q.rational(y)) is None + assert ask(Q.real(x**y), Q.imaginary(x) & Q.integer(y)) is None + assert ask(Q.real(x**y), Q.imaginary(x) & Q.odd(y)) is False + assert ask(Q.real(x**y), Q.imaginary(x) & Q.even(y)) is True + assert ask(Q.real(x**(y/z)), Q.real(x) & Q.real(y/z) & Q.rational(y/z) & Q.even(z) & Q.positive(x)) is True + assert ask(Q.real(x**(y/z)), Q.real(x) & Q.rational(y/z) & Q.even(z) & Q.negative(x)) is None + assert ask(Q.real(x**(y/z)), Q.real(x) & Q.integer(y/z)) is None + assert ask(Q.real(x**(y/z)), Q.real(x) & Q.real(y/z) & Q.positive(x)) is True + assert ask(Q.real(x**(y/z)), Q.real(x) & Q.real(y/z) & Q.negative(x)) is None + assert ask(Q.real((-I)**i), Q.imaginary(i)) is True + assert ask(Q.real(I**i), Q.imaginary(i)) is True + assert ask(Q.real(i**i), Q.imaginary(i)) is None # i might be 2*I + assert ask(Q.real(x**i), Q.imaginary(i)) is None # x could be 0 + assert ask(Q.real(x**(I*pi/log(x))), Q.real(x)) is True + + # https://github.com/sympy/sympy/issues/27485 + assert ask(Q.real(n**p), Q.negative(n) & Q.positive(p)) is None + + # https://github.com/sympy/sympy/issues/16530 + assert ask(Q.real(1/Abs(x))) is None + assert ask(Q.real(x**y), Q.zero(x) & Q.real(y)) is None + assert ask(Q.real(x**y), Q.zero(x) & Q.positive(y)) is True + + +@_both_exp_pow +def test_real_functions(): + # trigonometric functions + assert ask(Q.real(sin(x))) is None + assert ask(Q.real(cos(x))) is None + assert ask(Q.real(sin(x)), Q.real(x)) is True + assert ask(Q.real(cos(x)), Q.real(x)) is True + + # exponential function + assert ask(Q.real(exp(x))) is None + assert ask(Q.real(exp(x)), Q.real(x)) is True + assert ask(Q.real(x + exp(x)), Q.real(x)) is True + assert ask(Q.real(exp(2*pi*I, evaluate=False))) is True + assert ask(Q.real(exp(pi*I, evaluate=False))) is True + assert ask(Q.real(exp(pi*I/2, evaluate=False))) is False + + # logarithm + assert ask(Q.real(log(I))) is False + assert ask(Q.real(log(2*I))) is False + assert ask(Q.real(log(I + 1))) is False + assert ask(Q.real(log(x)), Q.complex(x)) is None + assert ask(Q.real(log(x)), Q.imaginary(x)) is False + assert ask(Q.real(log(exp(x))), Q.imaginary(x)) is None # exp(2*pi*I) is 1, log(exp(pi*I)) is pi*I (disregarding periodicity) + assert ask(Q.real(log(exp(x))), Q.complex(x)) is None + eq = Pow(exp(2*pi*I*x, evaluate=False), x, evaluate=False) + assert ask(Q.real(eq), Q.integer(x)) is True + assert ask(Q.real(exp(x)**x), Q.imaginary(x)) is True + assert ask(Q.real(exp(x)**x), Q.complex(x)) is None + + # Q.complexes + assert ask(Q.real(re(x))) is True + assert ask(Q.real(im(x))) is True + + +def test_matrix(): + + # hermitian + assert ask(Q.hermitian(Matrix([[2, 2 + I, 4], [2 - I, 3, I], [4, -I, 1]]))) == True + assert ask(Q.hermitian(Matrix([[2, 2 + I, 4], [2 + I, 3, I], [4, -I, 1]]))) == False + z = symbols('z', complex=True) + assert ask(Q.hermitian(Matrix([[2, 2 + I, z], [2 - I, 3, I], [4, -I, 1]]))) == None + assert ask(Q.hermitian(SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))))) == True + assert ask(Q.hermitian(SparseMatrix(((25, 15, -5), (15, I, 0), (-5, 0, 11))))) == False + assert ask(Q.hermitian(SparseMatrix(((25, 15, -5), (15, z, 0), (-5, 0, 11))))) == None + + # antihermitian + A = Matrix([[0, -2 - I, 0], [2 - I, 0, -I], [0, -I, 0]]) + B = Matrix([[-I, 2 + I, 0], [-2 + I, 0, 2 + I], [0, -2 + I, -I]]) + assert ask(Q.antihermitian(A)) is True + assert ask(Q.antihermitian(B)) is True + assert ask(Q.antihermitian(A**2)) is False + C = (B**3) + C.simplify() + assert ask(Q.antihermitian(C)) is True + _A = Matrix([[0, -2 - I, 0], [z, 0, -I], [0, -I, 0]]) + assert ask(Q.antihermitian(_A)) is None + + +@_both_exp_pow +def test_algebraic(): + assert ask(Q.algebraic(x)) is None + + assert ask(Q.algebraic(I)) is True + assert ask(Q.algebraic(2*I)) is True + assert ask(Q.algebraic(I/3)) is True + + assert ask(Q.algebraic(sqrt(7))) is True + assert ask(Q.algebraic(2*sqrt(7))) is True + assert ask(Q.algebraic(sqrt(7)/3)) is True + + assert ask(Q.algebraic(I*sqrt(3))) is True + assert ask(Q.algebraic(sqrt(1 + I*sqrt(3)))) is True + + assert ask(Q.algebraic(1 + I*sqrt(3)**Rational(17, 31))) is True + assert ask(Q.algebraic(1 + I*sqrt(3)**(17/pi))) is None + + for f in [exp, sin, tan, asin, atan, cos]: + assert ask(Q.algebraic(f(7))) is False + assert ask(Q.algebraic(f(7, evaluate=False))) is False + assert ask(Q.algebraic(f(0, evaluate=False))) is True + assert ask(Q.algebraic(f(x)), Q.algebraic(x)) is None + assert ask(Q.algebraic(f(x)), Q.algebraic(x) & Q.nonzero(x)) is False + + for g in [log, acos]: + assert ask(Q.algebraic(g(7))) is False + assert ask(Q.algebraic(g(7, evaluate=False))) is False + assert ask(Q.algebraic(g(1, evaluate=False))) is True + assert ask(Q.algebraic(g(x)), Q.algebraic(x)) is None + assert ask(Q.algebraic(g(x)), Q.algebraic(x) & Q.nonzero(x - 1)) is False + + for h in [cot, acot]: + assert ask(Q.algebraic(h(7))) is False + assert ask(Q.algebraic(h(7, evaluate=False))) is False + assert ask(Q.algebraic(h(x)), Q.algebraic(x)) is False + + assert ask(Q.algebraic(sqrt(sin(7)))) is None + assert ask(Q.algebraic(sqrt(y + I*sqrt(7)))) is None + + assert ask(Q.algebraic(2.47)) is True + + assert ask(Q.algebraic(x), Q.transcendental(x)) is False + assert ask(Q.transcendental(x), Q.algebraic(x)) is False + + #https://github.com/sympy/sympy/issues/27445 + assert ask(Q.algebraic(Pow(1, x, evaluate=False)), Q.algebraic(x)) is None + assert ask(Q.algebraic(Pow(x, y))) is None + assert ask(Q.algebraic(Pow(1, x, evaluate=False))) is None + assert ask(Q.algebraic(x**(pi*I))) is None + assert ask(Q.algebraic(pi**n),Q.integer(n) & Q.positive(n)) is False + assert ask(Q.algebraic(x**y),Q.algebraic(x) & Q.rational(y)) is True + + +def test_global(): + """Test ask with global assumptions""" + assert ask(Q.integer(x)) is None + global_assumptions.add(Q.integer(x)) + assert ask(Q.integer(x)) is True + global_assumptions.clear() + assert ask(Q.integer(x)) is None + + +def test_custom_context(): + """Test ask with custom assumptions context""" + assert ask(Q.integer(x)) is None + local_context = AssumptionsContext() + local_context.add(Q.integer(x)) + assert ask(Q.integer(x), context=local_context) is True + assert ask(Q.integer(x)) is None + + +def test_functions_in_assumptions(): + assert ask(Q.negative(x), Q.real(x) >> Q.positive(x)) is False + assert ask(Q.negative(x), Equivalent(Q.real(x), Q.positive(x))) is False + assert ask(Q.negative(x), Xor(Q.real(x), Q.negative(x))) is False + + +def test_composite_ask(): + assert ask(Q.negative(x) & Q.integer(x), + assumptions=Q.real(x) >> Q.positive(x)) is False + + +def test_composite_proposition(): + assert ask(True) is True + assert ask(False) is False + assert ask(~Q.negative(x), Q.positive(x)) is True + assert ask(~Q.real(x), Q.commutative(x)) is None + assert ask(Q.negative(x) & Q.integer(x), Q.positive(x)) is False + assert ask(Q.negative(x) & Q.integer(x)) is None + assert ask(Q.real(x) | Q.integer(x), Q.positive(x)) is True + assert ask(Q.real(x) | Q.integer(x)) is None + assert ask(Q.real(x) >> Q.positive(x), Q.negative(x)) is False + assert ask(Implies( + Q.real(x), Q.positive(x), evaluate=False), Q.negative(x)) is False + assert ask(Implies(Q.real(x), Q.positive(x), evaluate=False)) is None + assert ask(Equivalent(Q.integer(x), Q.even(x)), Q.even(x)) is True + assert ask(Equivalent(Q.integer(x), Q.even(x))) is None + assert ask(Equivalent(Q.positive(x), Q.integer(x)), Q.integer(x)) is None + assert ask(Q.real(x) | Q.integer(x), Q.real(x) | Q.integer(x)) is True + +def test_tautology(): + assert ask(Q.real(x) | ~Q.real(x)) is True + assert ask(Q.real(x) & ~Q.real(x)) is False + +def test_composite_assumptions(): + assert ask(Q.real(x), Q.real(x) & Q.real(y)) is True + assert ask(Q.positive(x), Q.positive(x) | Q.positive(y)) is None + assert ask(Q.positive(x), Q.real(x) >> Q.positive(y)) is None + assert ask(Q.real(x), ~(Q.real(x) >> Q.real(y))) is True + +def test_key_extensibility(): + """test that you can add keys to the ask system at runtime""" + # make sure the key is not defined + raises(AttributeError, lambda: ask(Q.my_key(x))) + + # Old handler system + class MyAskHandler(AskHandler): + @staticmethod + def Symbol(expr, assumptions): + return True + try: + with warns_deprecated_sympy(): + register_handler('my_key', MyAskHandler) + with warns_deprecated_sympy(): + assert ask(Q.my_key(x)) is True + with warns_deprecated_sympy(): + assert ask(Q.my_key(x + 1)) is None + finally: + # We have to disable the stacklevel testing here because this raises + # the warning twice from two different places + with warns_deprecated_sympy(): + remove_handler('my_key', MyAskHandler) + del Q.my_key + raises(AttributeError, lambda: ask(Q.my_key(x))) + + # New handler system + class MyPredicate(Predicate): + pass + try: + Q.my_key = MyPredicate() + @Q.my_key.register(Symbol) + def _(expr, assumptions): + return True + assert ask(Q.my_key(x)) is True + assert ask(Q.my_key(x+1)) is None + finally: + del Q.my_key + raises(AttributeError, lambda: ask(Q.my_key(x))) + + +def test_type_extensibility(): + """test that new types can be added to the ask system at runtime + """ + from sympy.core import Basic + + class MyType(Basic): + pass + + @Q.prime.register(MyType) + def _(expr, assumptions): + return True + + assert ask(Q.prime(MyType())) is True + + +def test_single_fact_lookup(): + known_facts = And(Implies(Q.integer, Q.rational), + Implies(Q.rational, Q.real), + Implies(Q.real, Q.complex)) + known_facts_keys = {Q.integer, Q.rational, Q.real, Q.complex} + + known_facts_cnf = to_cnf(known_facts) + mapping = single_fact_lookup(known_facts_keys, known_facts_cnf) + + assert mapping[Q.rational] == {Q.real, Q.rational, Q.complex} + + +def test_generate_known_facts_dict(): + known_facts = And(Implies(Q.integer(x), Q.rational(x)), + Implies(Q.rational(x), Q.real(x)), + Implies(Q.real(x), Q.complex(x))) + known_facts_keys = {Q.integer(x), Q.rational(x), Q.real(x), Q.complex(x)} + + assert generate_known_facts_dict(known_facts_keys, known_facts) == \ + {Q.complex: ({Q.complex}, set()), + Q.integer: ({Q.complex, Q.integer, Q.rational, Q.real}, set()), + Q.rational: ({Q.complex, Q.rational, Q.real}, set()), + Q.real: ({Q.complex, Q.real}, set())} + + +@slow +def test_known_facts_consistent(): + """"Test that ask_generated.py is up-to-date""" + x = Symbol('x') + fact = get_known_facts(x) + # test cnf clauses of fact between unary predicates + cnf = CNF.to_CNF(fact) + clauses = set() + clauses.update(frozenset(Literal(lit.arg.function, lit.is_Not) for lit in sorted(cl, key=str)) for cl in cnf.clauses) + assert get_all_known_facts() == clauses + # test dictionary of fact between unary predicates + keys = [pred(x) for pred in get_known_facts_keys()] + mapping = generate_known_facts_dict(keys, fact) + assert get_known_facts_dict() == mapping + + +def test_Add_queries(): + assert ask(Q.prime(12345678901234567890 + (cos(1)**2 + sin(1)**2))) is True + assert ask(Q.even(Add(S(2), S(2), evaluate=False))) is True + assert ask(Q.prime(Add(S(2), S(2), evaluate=False))) is False + assert ask(Q.integer(Add(S(2), S(2), evaluate=False))) is True + + +def test_positive_assuming(): + with assuming(Q.positive(x + 1)): + assert not ask(Q.positive(x)) + + +def test_issue_5421(): + raises(TypeError, lambda: ask(pi/log(x), Q.real)) + + +def test_issue_3906(): + raises(TypeError, lambda: ask(Q.positive)) + + +def test_issue_5833(): + assert ask(Q.positive(log(x)**2), Q.positive(x)) is None + assert ask(~Q.negative(log(x)**2), Q.positive(x)) is True + + +def test_issue_6732(): + raises(ValueError, lambda: ask(Q.positive(x), Q.positive(x) & Q.negative(x))) + raises(ValueError, lambda: ask(Q.negative(x), Q.positive(x) & Q.negative(x))) + + +def test_issue_7246(): + assert ask(Q.positive(atan(p)), Q.positive(p)) is True + assert ask(Q.positive(atan(p)), Q.negative(p)) is False + assert ask(Q.positive(atan(p)), Q.zero(p)) is False + assert ask(Q.positive(atan(x))) is None + + assert ask(Q.positive(asin(p)), Q.positive(p)) is None + assert ask(Q.positive(asin(p)), Q.zero(p)) is None + assert ask(Q.positive(asin(Rational(1, 7)))) is True + assert ask(Q.positive(asin(x)), Q.positive(x) & Q.nonpositive(x - 1)) is True + assert ask(Q.positive(asin(x)), Q.negative(x) & Q.nonnegative(x + 1)) is False + + assert ask(Q.positive(acos(p)), Q.positive(p)) is None + assert ask(Q.positive(acos(Rational(1, 7)))) is True + assert ask(Q.positive(acos(x)), Q.nonnegative(x + 1) & Q.nonpositive(x - 1)) is True + assert ask(Q.positive(acos(x)), Q.nonnegative(x - 1)) is None + + assert ask(Q.positive(acot(x)), Q.positive(x)) is True + assert ask(Q.positive(acot(x)), Q.real(x)) is True + assert ask(Q.positive(acot(x)), Q.imaginary(x)) is False + assert ask(Q.positive(acot(x))) is None + + +@XFAIL +def test_issue_7246_failing(): + #Move this test to test_issue_7246 once + #the new assumptions module is improved. + assert ask(Q.positive(acos(x)), Q.zero(x)) is True + + +def test_check_old_assumption(): + x = symbols('x', real=True) + assert ask(Q.real(x)) is True + assert ask(Q.imaginary(x)) is False + assert ask(Q.complex(x)) is True + + x = symbols('x', imaginary=True) + assert ask(Q.real(x)) is False + assert ask(Q.imaginary(x)) is True + assert ask(Q.complex(x)) is True + + x = symbols('x', complex=True) + assert ask(Q.real(x)) is None + assert ask(Q.complex(x)) is True + + x = symbols('x', positive=True) + assert ask(Q.positive(x)) is True + assert ask(Q.negative(x)) is False + assert ask(Q.real(x)) is True + + x = symbols('x', commutative=False) + assert ask(Q.commutative(x)) is False + + x = symbols('x', negative=True) + assert ask(Q.positive(x)) is False + assert ask(Q.negative(x)) is True + + x = symbols('x', nonnegative=True) + assert ask(Q.negative(x)) is False + assert ask(Q.positive(x)) is None + assert ask(Q.zero(x)) is None + + x = symbols('x', finite=True) + assert ask(Q.finite(x)) is True + + x = symbols('x', prime=True) + assert ask(Q.prime(x)) is True + assert ask(Q.composite(x)) is False + + x = symbols('x', composite=True) + assert ask(Q.prime(x)) is False + assert ask(Q.composite(x)) is True + + x = symbols('x', even=True) + assert ask(Q.even(x)) is True + assert ask(Q.odd(x)) is False + + x = symbols('x', odd=True) + assert ask(Q.even(x)) is False + assert ask(Q.odd(x)) is True + + x = symbols('x', nonzero=True) + assert ask(Q.nonzero(x)) is True + assert ask(Q.zero(x)) is False + + x = symbols('x', zero=True) + assert ask(Q.zero(x)) is True + + x = symbols('x', integer=True) + assert ask(Q.integer(x)) is True + + x = symbols('x', rational=True) + assert ask(Q.rational(x)) is True + assert ask(Q.irrational(x)) is False + + x = symbols('x', irrational=True) + assert ask(Q.irrational(x)) is True + assert ask(Q.rational(x)) is False + + +def test_issue_9636(): + assert ask(Q.integer(1.0)) is None + assert ask(Q.prime(3.0)) is None + assert ask(Q.composite(4.0)) is None + assert ask(Q.even(2.0)) is None + assert ask(Q.odd(3.0)) is None + + +def test_autosimp_used_to_fail(): + # See issue #9807 + assert ask(Q.imaginary(0**I)) is None + assert ask(Q.imaginary(0**(-I))) is None + assert ask(Q.real(0**I)) is None + assert ask(Q.real(0**(-I))) is None + + +def test_custom_AskHandler(): + from sympy.logic.boolalg import conjuncts + + # Old handler system + class MersenneHandler(AskHandler): + @staticmethod + def Integer(expr, assumptions): + if ask(Q.integer(log(expr + 1, 2))): + return True + @staticmethod + def Symbol(expr, assumptions): + if expr in conjuncts(assumptions): + return True + try: + with warns_deprecated_sympy(): + register_handler('mersenne', MersenneHandler) + n = Symbol('n', integer=True) + with warns_deprecated_sympy(): + assert ask(Q.mersenne(7)) + with warns_deprecated_sympy(): + assert ask(Q.mersenne(n), Q.mersenne(n)) + finally: + del Q.mersenne + + # New handler system + class MersennePredicate(Predicate): + pass + try: + Q.mersenne = MersennePredicate() + @Q.mersenne.register(Integer) + def _(expr, assumptions): + if ask(Q.integer(log(expr + 1, 2))): + return True + @Q.mersenne.register(Symbol) + def _(expr, assumptions): + if expr in conjuncts(assumptions): + return True + assert ask(Q.mersenne(7)) + assert ask(Q.mersenne(n), Q.mersenne(n)) + finally: + del Q.mersenne + + +def test_polyadic_predicate(): + + class SexyPredicate(Predicate): + pass + try: + Q.sexyprime = SexyPredicate() + + @Q.sexyprime.register(Integer, Integer) + def _(int1, int2, assumptions): + args = sorted([int1, int2]) + if not all(ask(Q.prime(a), assumptions) for a in args): + return False + return args[1] - args[0] == 6 + + @Q.sexyprime.register(Integer, Integer, Integer) + def _(int1, int2, int3, assumptions): + args = sorted([int1, int2, int3]) + if not all(ask(Q.prime(a), assumptions) for a in args): + return False + return args[2] - args[1] == 6 and args[1] - args[0] == 6 + + assert ask(Q.sexyprime(5, 11)) + assert ask(Q.sexyprime(7, 13, 19)) + finally: + del Q.sexyprime + + +def test_Predicate_handler_is_unique(): + + # Undefined predicate does not have a handler + assert Predicate('mypredicate').handler is None + + # Handler of defined predicate is unique to the class + class MyPredicate(Predicate): + pass + mp1 = MyPredicate(Str('mp1')) + mp2 = MyPredicate(Str('mp2')) + assert mp1.handler is mp2.handler + + +def test_relational(): + assert ask(Q.eq(x, 0), Q.zero(x)) + assert not ask(Q.eq(x, 0), Q.nonzero(x)) + assert not ask(Q.ne(x, 0), Q.zero(x)) + assert ask(Q.ne(x, 0), Q.nonzero(x)) + + +def test_issue_25221(): + assert ask(Q.transcendental(x), Q.algebraic(x) | Q.positive(y,y)) is None + assert ask(Q.transcendental(x), Q.algebraic(x) | (0 > y)) is None + assert ask(Q.transcendental(x), Q.algebraic(x) | Q.gt(0,y)) is None + + +def test_issue_27440(): + nan = S.NaN + assert ask(Q.negative(nan)) is None diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_refine.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_refine.py new file mode 100644 index 0000000000000000000000000000000000000000..81533a88b232cd5c3cfb9be17d09dad404d679dc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_refine.py @@ -0,0 +1,227 @@ +from sympy.assumptions.ask import Q +from sympy.assumptions.refine import refine +from sympy.core.expr import Expr +from sympy.core.numbers import (I, Rational, nan, pi) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import (Abs, arg, im, re, sign) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (atan, atan2) +from sympy.abc import w, x, y, z +from sympy.core.relational import Eq, Ne +from sympy.functions.elementary.piecewise import Piecewise +from sympy.matrices.expressions.matexpr import MatrixSymbol + + +def test_Abs(): + assert refine(Abs(x), Q.positive(x)) == x + assert refine(1 + Abs(x), Q.positive(x)) == 1 + x + assert refine(Abs(x), Q.negative(x)) == -x + assert refine(1 + Abs(x), Q.negative(x)) == 1 - x + + assert refine(Abs(x**2)) != x**2 + assert refine(Abs(x**2), Q.real(x)) == x**2 + + +def test_pow1(): + assert refine((-1)**x, Q.even(x)) == 1 + assert refine((-1)**x, Q.odd(x)) == -1 + assert refine((-2)**x, Q.even(x)) == 2**x + + # nested powers + assert refine(sqrt(x**2)) != Abs(x) + assert refine(sqrt(x**2), Q.complex(x)) != Abs(x) + assert refine(sqrt(x**2), Q.real(x)) == Abs(x) + assert refine(sqrt(x**2), Q.positive(x)) == x + assert refine((x**3)**Rational(1, 3)) != x + + assert refine((x**3)**Rational(1, 3), Q.real(x)) != x + assert refine((x**3)**Rational(1, 3), Q.positive(x)) == x + + assert refine(sqrt(1/x), Q.real(x)) != 1/sqrt(x) + assert refine(sqrt(1/x), Q.positive(x)) == 1/sqrt(x) + + # powers of (-1) + assert refine((-1)**(x + y), Q.even(x)) == (-1)**y + assert refine((-1)**(x + y + z), Q.odd(x) & Q.odd(z)) == (-1)**y + assert refine((-1)**(x + y + 1), Q.odd(x)) == (-1)**y + assert refine((-1)**(x + y + 2), Q.odd(x)) == (-1)**(y + 1) + assert refine((-1)**(x + 3)) == (-1)**(x + 1) + + # continuation + assert refine((-1)**((-1)**x/2 - S.Half), Q.integer(x)) == (-1)**x + assert refine((-1)**((-1)**x/2 + S.Half), Q.integer(x)) == (-1)**(x + 1) + assert refine((-1)**((-1)**x/2 + 5*S.Half), Q.integer(x)) == (-1)**(x + 1) + + +def test_pow2(): + assert refine((-1)**((-1)**x/2 - 7*S.Half), Q.integer(x)) == (-1)**(x + 1) + assert refine((-1)**((-1)**x/2 - 9*S.Half), Q.integer(x)) == (-1)**x + + # powers of Abs + assert refine(Abs(x)**2, Q.real(x)) == x**2 + assert refine(Abs(x)**3, Q.real(x)) == Abs(x)**3 + assert refine(Abs(x)**2) == Abs(x)**2 + + +def test_exp(): + x = Symbol('x', integer=True) + assert refine(exp(pi*I*2*x)) == 1 + assert refine(exp(pi*I*2*(x + S.Half))) == -1 + assert refine(exp(pi*I*2*(x + Rational(1, 4)))) == I + assert refine(exp(pi*I*2*(x + Rational(3, 4)))) == -I + + +def test_Piecewise(): + assert refine(Piecewise((1, x < 0), (3, True)), (x < 0)) == 1 + assert refine(Piecewise((1, x < 0), (3, True)), ~(x < 0)) == 3 + assert refine(Piecewise((1, x < 0), (3, True)), (y < 0)) == \ + Piecewise((1, x < 0), (3, True)) + assert refine(Piecewise((1, x > 0), (3, True)), (x > 0)) == 1 + assert refine(Piecewise((1, x > 0), (3, True)), ~(x > 0)) == 3 + assert refine(Piecewise((1, x > 0), (3, True)), (y > 0)) == \ + Piecewise((1, x > 0), (3, True)) + assert refine(Piecewise((1, x <= 0), (3, True)), (x <= 0)) == 1 + assert refine(Piecewise((1, x <= 0), (3, True)), ~(x <= 0)) == 3 + assert refine(Piecewise((1, x <= 0), (3, True)), (y <= 0)) == \ + Piecewise((1, x <= 0), (3, True)) + assert refine(Piecewise((1, x >= 0), (3, True)), (x >= 0)) == 1 + assert refine(Piecewise((1, x >= 0), (3, True)), ~(x >= 0)) == 3 + assert refine(Piecewise((1, x >= 0), (3, True)), (y >= 0)) == \ + Piecewise((1, x >= 0), (3, True)) + assert refine(Piecewise((1, Eq(x, 0)), (3, True)), (Eq(x, 0)))\ + == 1 + assert refine(Piecewise((1, Eq(x, 0)), (3, True)), (Eq(0, x)))\ + == 1 + assert refine(Piecewise((1, Eq(x, 0)), (3, True)), ~(Eq(x, 0)))\ + == 3 + assert refine(Piecewise((1, Eq(x, 0)), (3, True)), ~(Eq(0, x)))\ + == 3 + assert refine(Piecewise((1, Eq(x, 0)), (3, True)), (Eq(y, 0)))\ + == Piecewise((1, Eq(x, 0)), (3, True)) + assert refine(Piecewise((1, Ne(x, 0)), (3, True)), (Ne(x, 0)))\ + == 1 + assert refine(Piecewise((1, Ne(x, 0)), (3, True)), ~(Ne(x, 0)))\ + == 3 + assert refine(Piecewise((1, Ne(x, 0)), (3, True)), (Ne(y, 0)))\ + == Piecewise((1, Ne(x, 0)), (3, True)) + + +def test_atan2(): + assert refine(atan2(y, x), Q.real(y) & Q.positive(x)) == atan(y/x) + assert refine(atan2(y, x), Q.negative(y) & Q.positive(x)) == atan(y/x) + assert refine(atan2(y, x), Q.negative(y) & Q.negative(x)) == atan(y/x) - pi + assert refine(atan2(y, x), Q.positive(y) & Q.negative(x)) == atan(y/x) + pi + assert refine(atan2(y, x), Q.zero(y) & Q.negative(x)) == pi + assert refine(atan2(y, x), Q.positive(y) & Q.zero(x)) == pi/2 + assert refine(atan2(y, x), Q.negative(y) & Q.zero(x)) == -pi/2 + assert refine(atan2(y, x), Q.zero(y) & Q.zero(x)) is nan + + +def test_re(): + assert refine(re(x), Q.real(x)) == x + assert refine(re(x), Q.imaginary(x)) is S.Zero + assert refine(re(x+y), Q.real(x) & Q.real(y)) == x + y + assert refine(re(x+y), Q.real(x) & Q.imaginary(y)) == x + assert refine(re(x*y), Q.real(x) & Q.real(y)) == x * y + assert refine(re(x*y), Q.real(x) & Q.imaginary(y)) == 0 + assert refine(re(x*y*z), Q.real(x) & Q.real(y) & Q.real(z)) == x * y * z + + +def test_im(): + assert refine(im(x), Q.imaginary(x)) == -I*x + assert refine(im(x), Q.real(x)) is S.Zero + assert refine(im(x+y), Q.imaginary(x) & Q.imaginary(y)) == -I*x - I*y + assert refine(im(x+y), Q.real(x) & Q.imaginary(y)) == -I*y + assert refine(im(x*y), Q.imaginary(x) & Q.real(y)) == -I*x*y + assert refine(im(x*y), Q.imaginary(x) & Q.imaginary(y)) == 0 + assert refine(im(1/x), Q.imaginary(x)) == -I/x + assert refine(im(x*y*z), Q.imaginary(x) & Q.imaginary(y) + & Q.imaginary(z)) == -I*x*y*z + + +def test_complex(): + assert refine(re(1/(x + I*y)), Q.real(x) & Q.real(y)) == \ + x/(x**2 + y**2) + assert refine(im(1/(x + I*y)), Q.real(x) & Q.real(y)) == \ + -y/(x**2 + y**2) + assert refine(re((w + I*x) * (y + I*z)), Q.real(w) & Q.real(x) & Q.real(y) + & Q.real(z)) == w*y - x*z + assert refine(im((w + I*x) * (y + I*z)), Q.real(w) & Q.real(x) & Q.real(y) + & Q.real(z)) == w*z + x*y + + +def test_sign(): + x = Symbol('x', real = True) + assert refine(sign(x), Q.positive(x)) == 1 + assert refine(sign(x), Q.negative(x)) == -1 + assert refine(sign(x), Q.zero(x)) == 0 + assert refine(sign(x), True) == sign(x) + assert refine(sign(Abs(x)), Q.nonzero(x)) == 1 + + x = Symbol('x', imaginary=True) + assert refine(sign(x), Q.positive(im(x))) == S.ImaginaryUnit + assert refine(sign(x), Q.negative(im(x))) == -S.ImaginaryUnit + assert refine(sign(x), True) == sign(x) + + x = Symbol('x', complex=True) + assert refine(sign(x), Q.zero(x)) == 0 + +def test_arg(): + x = Symbol('x', complex = True) + assert refine(arg(x), Q.positive(x)) == 0 + assert refine(arg(x), Q.negative(x)) == pi + +def test_func_args(): + class MyClass(Expr): + # A class with nontrivial .func + + def __init__(self, *args): + self.my_member = "" + + @property + def func(self): + def my_func(*args): + obj = MyClass(*args) + obj.my_member = self.my_member + return obj + return my_func + + x = MyClass() + x.my_member = "A very important value" + assert x.my_member == refine(x).my_member + +def test_issue_refine_9384(): + assert refine(Piecewise((1, x < 0), (0, True)), Q.positive(x)) == 0 + assert refine(Piecewise((1, x < 0), (0, True)), Q.negative(x)) == 1 + assert refine(Piecewise((1, x > 0), (0, True)), Q.positive(x)) == 1 + assert refine(Piecewise((1, x > 0), (0, True)), Q.negative(x)) == 0 + + +def test_eval_refine(): + class MockExpr(Expr): + def _eval_refine(self, assumptions): + return True + + mock_obj = MockExpr() + assert refine(mock_obj) + +def test_refine_issue_12724(): + expr1 = refine(Abs(x * y), Q.positive(x)) + expr2 = refine(Abs(x * y * z), Q.positive(x)) + assert expr1 == x * Abs(y) + assert expr2 == x * Abs(y * z) + y1 = Symbol('y1', real = True) + expr3 = refine(Abs(x * y1**2 * z), Q.positive(x)) + assert expr3 == x * y1**2 * Abs(z) + + +def test_matrixelement(): + x = MatrixSymbol('x', 3, 3) + i = Symbol('i', positive = True) + j = Symbol('j', positive = True) + assert refine(x[0, 1], Q.symmetric(x)) == x[0, 1] + assert refine(x[1, 0], Q.symmetric(x)) == x[0, 1] + assert refine(x[i, j], Q.symmetric(x)) == x[j, i] + assert refine(x[j, i], Q.symmetric(x)) == x[j, i] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_rel_queries.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_rel_queries.py new file mode 100644 index 0000000000000000000000000000000000000000..46fe3a35dc1adb23668e88d5794fe1c0ab22f33a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_rel_queries.py @@ -0,0 +1,172 @@ +from sympy.assumptions.lra_satask import lra_satask +from sympy.logic.algorithms.lra_theory import UnhandledInput +from sympy.assumptions.ask import Q, ask + +from sympy.core import symbols, Symbol +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.core.numbers import I + +from sympy.testing.pytest import raises, XFAIL +x, y, z = symbols("x y z", real=True) + +def test_lra_satask(): + im = Symbol('im', imaginary=True) + + # test preprocessing of unequalities is working correctly + assert lra_satask(Q.eq(x, 1), ~Q.ne(x, 0)) is False + assert lra_satask(Q.eq(x, 0), ~Q.ne(x, 0)) is True + assert lra_satask(~Q.ne(x, 0), Q.eq(x, 0)) is True + assert lra_satask(~Q.eq(x, 0), Q.eq(x, 0)) is False + assert lra_satask(Q.ne(x, 0), Q.eq(x, 0)) is False + + # basic tests + assert lra_satask(Q.ne(x, x)) is False + assert lra_satask(Q.eq(x, x)) is True + assert lra_satask(Q.gt(x, 0), Q.gt(x, 1)) is True + + # check that True/False are handled + assert lra_satask(Q.gt(x, 0), True) is None + assert raises(ValueError, lambda: lra_satask(Q.gt(x, 0), False)) + + # check imaginary numbers are correctly handled + # (im * I).is_real returns True so this is an edge case + raises(UnhandledInput, lambda: lra_satask(Q.gt(im * I, 0), Q.gt(im * I, 0))) + + # check matrix inputs + X = MatrixSymbol("X", 2, 2) + raises(UnhandledInput, lambda: lra_satask(Q.lt(X, 2) & Q.gt(X, 3))) + + +def test_old_assumptions(): + # test unhandled old assumptions + w = symbols("w") + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", rational=False, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", odd=True, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", even=True, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", prime=True, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", composite=True, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", integer=True, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + w = symbols("w", integer=False, real=True) + raises(UnhandledInput, lambda: lra_satask(Q.lt(w, 2) & Q.gt(w, 3))) + + # test handled + w = symbols("w", positive=True, real=True) + assert lra_satask(Q.le(w, 0)) is False + assert lra_satask(Q.gt(w, 0)) is True + w = symbols("w", negative=True, real=True) + assert lra_satask(Q.lt(w, 0)) is True + assert lra_satask(Q.ge(w, 0)) is False + w = symbols("w", zero=True, real=True) + assert lra_satask(Q.eq(w, 0)) is True + assert lra_satask(Q.ne(w, 0)) is False + w = symbols("w", nonzero=True, real=True) + assert lra_satask(Q.ne(w, 0)) is True + assert lra_satask(Q.eq(w, 1)) is None + w = symbols("w", nonpositive=True, real=True) + assert lra_satask(Q.le(w, 0)) is True + assert lra_satask(Q.gt(w, 0)) is False + w = symbols("w", nonnegative=True, real=True) + assert lra_satask(Q.ge(w, 0)) is True + assert lra_satask(Q.lt(w, 0)) is False + + +def test_rel_queries(): + assert ask(Q.lt(x, 2) & Q.gt(x, 3)) is False + assert ask(Q.positive(x - z), (x > y) & (y > z)) is True + assert ask(x + y > 2, (x < 0) & (y <0)) is False + assert ask(x > z, (x > y) & (y > z)) is True + + +def test_unhandled_queries(): + X = MatrixSymbol("X", 2, 2) + assert ask(Q.lt(X, 2) & Q.gt(X, 3)) is None + + +def test_all_pred(): + # test usable pred + assert lra_satask(Q.extended_positive(x), (x > 2)) is True + assert lra_satask(Q.positive_infinite(x)) is False + assert lra_satask(Q.negative_infinite(x)) is False + + # test disallowed pred + raises(UnhandledInput, lambda: lra_satask((x > 0), (x > 2) & Q.prime(x))) + raises(UnhandledInput, lambda: lra_satask((x > 0), (x > 2) & Q.composite(x))) + raises(UnhandledInput, lambda: lra_satask((x > 0), (x > 2) & Q.odd(x))) + raises(UnhandledInput, lambda: lra_satask((x > 0), (x > 2) & Q.even(x))) + raises(UnhandledInput, lambda: lra_satask((x > 0), (x > 2) & Q.integer(x))) + + +def test_number_line_properties(): + # From: + # https://en.wikipedia.org/wiki/Inequality_(mathematics)#Properties_on_the_number_line + + a, b, c = symbols("a b c", real=True) + + # Transitivity + # If a <= b and b <= c, then a <= c. + assert ask(a <= c, (a <= b) & (b <= c)) is True + # If a <= b and b < c, then a < c. + assert ask(a < c, (a <= b) & (b < c)) is True + # If a < b and b <= c, then a < c. + assert ask(a < c, (a < b) & (b <= c)) is True + + # Addition and subtraction + # If a <= b, then a + c <= b + c and a - c <= b - c. + assert ask(a + c <= b + c, a <= b) is True + assert ask(a - c <= b - c, a <= b) is True + + +@XFAIL +def test_failing_number_line_properties(): + # From: + # https://en.wikipedia.org/wiki/Inequality_(mathematics)#Properties_on_the_number_line + + a, b, c = symbols("a b c", real=True) + + # Multiplication and division + # If a <= b and c > 0, then ac <= bc and a/c <= b/c. (True for non-zero c) + assert ask(a*c <= b*c, (a <= b) & (c > 0) & ~ Q.zero(c)) is True + assert ask(a/c <= b/c, (a <= b) & (c > 0) & ~ Q.zero(c)) is True + # If a <= b and c < 0, then ac >= bc and a/c >= b/c. (True for non-zero c) + assert ask(a*c >= b*c, (a <= b) & (c < 0) & ~ Q.zero(c)) is True + assert ask(a/c >= b/c, (a <= b) & (c < 0) & ~ Q.zero(c)) is True + + # Additive inverse + # If a <= b, then -a >= -b. + assert ask(-a >= -b, a <= b) is True + + # Multiplicative inverse + # For a, b that are both negative or both positive: + # If a <= b, then 1/a >= 1/b . + assert ask(1/a >= 1/b, (a <= b) & Q.positive(x) & Q.positive(b)) is True + assert ask(1/a >= 1/b, (a <= b) & Q.negative(x) & Q.negative(b)) is True + + +def test_equality(): + # test symmetry and reflexivity + assert ask(Q.eq(x, x)) is True + assert ask(Q.eq(y, x), Q.eq(x, y)) is True + assert ask(Q.eq(y, x), ~Q.eq(z, z) | Q.eq(x, y)) is True + + # test transitivity + assert ask(Q.eq(x,z), Q.eq(x,y) & Q.eq(y,z)) is True + + +@XFAIL +def test_equality_failing(): + # Note that implementing the substitution property of equality + # most likely requires a redesign of the new assumptions. + # See issue #25485 for why this is the case and general ideas + # about how things could be redesigned. + + # test substitution property + assert ask(Q.prime(x), Q.eq(x, y) & Q.prime(y)) is True + assert ask(Q.real(x), Q.eq(x, y) & Q.real(y)) is True + assert ask(Q.imaginary(x), Q.eq(x, y) & Q.imaginary(y)) is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_satask.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_satask.py new file mode 100644 index 0000000000000000000000000000000000000000..5831b69e3e6bf2b1a906d1140967510c2ea8b630 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_satask.py @@ -0,0 +1,378 @@ +from sympy.assumptions.ask import Q +from sympy.assumptions.assume import assuming +from sympy.core.numbers import (I, pi) +from sympy.core.relational import (Eq, Gt) +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.complexes import Abs +from sympy.logic.boolalg import Implies +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.assumptions.cnf import CNF, Literal +from sympy.assumptions.satask import (satask, extract_predargs, + get_relevant_clsfacts) + +from sympy.testing.pytest import raises, XFAIL + + +x, y, z = symbols('x y z') + + +def test_satask(): + # No relevant facts + assert satask(Q.real(x), Q.real(x)) is True + assert satask(Q.real(x), ~Q.real(x)) is False + assert satask(Q.real(x)) is None + + assert satask(Q.real(x), Q.positive(x)) is True + assert satask(Q.positive(x), Q.real(x)) is None + assert satask(Q.real(x), ~Q.positive(x)) is None + assert satask(Q.positive(x), ~Q.real(x)) is False + + raises(ValueError, lambda: satask(Q.real(x), Q.real(x) & ~Q.real(x))) + + with assuming(Q.positive(x)): + assert satask(Q.real(x)) is True + assert satask(~Q.positive(x)) is False + raises(ValueError, lambda: satask(Q.real(x), ~Q.positive(x))) + + assert satask(Q.zero(x), Q.nonzero(x)) is False + assert satask(Q.positive(x), Q.zero(x)) is False + assert satask(Q.real(x), Q.zero(x)) is True + assert satask(Q.zero(x), Q.zero(x*y)) is None + assert satask(Q.zero(x*y), Q.zero(x)) + + +def test_zero(): + """ + Everything in this test doesn't work with the ask handlers, and most + things would be very difficult or impossible to make work under that + model. + + """ + assert satask(Q.zero(x) | Q.zero(y), Q.zero(x*y)) is True + assert satask(Q.zero(x*y), Q.zero(x) | Q.zero(y)) is True + + assert satask(Implies(Q.zero(x), Q.zero(x*y))) is True + + # This one in particular requires computing the fixed-point of the + # relevant facts, because going from Q.nonzero(x*y) -> ~Q.zero(x*y) and + # Q.zero(x*y) -> Equivalent(Q.zero(x*y), Q.zero(x) | Q.zero(y)) takes two + # steps. + assert satask(Q.zero(x) | Q.zero(y), Q.nonzero(x*y)) is False + + assert satask(Q.zero(x), Q.zero(x**2)) is True + + +def test_zero_positive(): + assert satask(Q.zero(x + y), Q.positive(x) & Q.positive(y)) is False + assert satask(Q.positive(x) & Q.positive(y), Q.zero(x + y)) is False + assert satask(Q.nonzero(x + y), Q.positive(x) & Q.positive(y)) is True + assert satask(Q.positive(x) & Q.positive(y), Q.nonzero(x + y)) is None + + # This one requires several levels of forward chaining + assert satask(Q.zero(x*(x + y)), Q.positive(x) & Q.positive(y)) is False + + assert satask(Q.positive(pi*x*y + 1), Q.positive(x) & Q.positive(y)) is True + assert satask(Q.positive(pi*x*y - 5), Q.positive(x) & Q.positive(y)) is None + + +def test_zero_pow(): + assert satask(Q.zero(x**y), Q.zero(x) & Q.positive(y)) is True + assert satask(Q.zero(x**y), Q.nonzero(x) & Q.zero(y)) is False + + assert satask(Q.zero(x), Q.zero(x**y)) is True + + assert satask(Q.zero(x**y), Q.zero(x)) is None + + +@XFAIL +# Requires correct Q.square calculation first +def test_invertible(): + A = MatrixSymbol('A', 5, 5) + B = MatrixSymbol('B', 5, 5) + assert satask(Q.invertible(A*B), Q.invertible(A) & Q.invertible(B)) is True + assert satask(Q.invertible(A), Q.invertible(A*B)) is True + assert satask(Q.invertible(A) & Q.invertible(B), Q.invertible(A*B)) is True + + +def test_prime(): + assert satask(Q.prime(5)) is True + assert satask(Q.prime(6)) is False + assert satask(Q.prime(-5)) is False + + assert satask(Q.prime(x*y), Q.integer(x) & Q.integer(y)) is None + assert satask(Q.prime(x*y), Q.prime(x) & Q.prime(y)) is False + + +def test_old_assump(): + assert satask(Q.positive(1)) is True + assert satask(Q.positive(-1)) is False + assert satask(Q.positive(0)) is False + assert satask(Q.positive(I)) is False + assert satask(Q.positive(pi)) is True + + assert satask(Q.negative(1)) is False + assert satask(Q.negative(-1)) is True + assert satask(Q.negative(0)) is False + assert satask(Q.negative(I)) is False + assert satask(Q.negative(pi)) is False + + assert satask(Q.zero(1)) is False + assert satask(Q.zero(-1)) is False + assert satask(Q.zero(0)) is True + assert satask(Q.zero(I)) is False + assert satask(Q.zero(pi)) is False + + assert satask(Q.nonzero(1)) is True + assert satask(Q.nonzero(-1)) is True + assert satask(Q.nonzero(0)) is False + assert satask(Q.nonzero(I)) is False + assert satask(Q.nonzero(pi)) is True + + assert satask(Q.nonpositive(1)) is False + assert satask(Q.nonpositive(-1)) is True + assert satask(Q.nonpositive(0)) is True + assert satask(Q.nonpositive(I)) is False + assert satask(Q.nonpositive(pi)) is False + + assert satask(Q.nonnegative(1)) is True + assert satask(Q.nonnegative(-1)) is False + assert satask(Q.nonnegative(0)) is True + assert satask(Q.nonnegative(I)) is False + assert satask(Q.nonnegative(pi)) is True + + +def test_rational_irrational(): + assert satask(Q.irrational(2)) is False + assert satask(Q.rational(2)) is True + assert satask(Q.irrational(pi)) is True + assert satask(Q.rational(pi)) is False + assert satask(Q.irrational(I)) is False + assert satask(Q.rational(I)) is False + + assert satask(Q.irrational(x*y*z), Q.irrational(x) & Q.irrational(y) & + Q.rational(z)) is None + assert satask(Q.irrational(x*y*z), Q.irrational(x) & Q.rational(y) & + Q.rational(z)) is True + assert satask(Q.irrational(pi*x*y), Q.rational(x) & Q.rational(y)) is True + + assert satask(Q.irrational(x + y + z), Q.irrational(x) & Q.irrational(y) & + Q.rational(z)) is None + assert satask(Q.irrational(x + y + z), Q.irrational(x) & Q.rational(y) & + Q.rational(z)) is True + assert satask(Q.irrational(pi + x + y), Q.rational(x) & Q.rational(y)) is True + + assert satask(Q.irrational(x*y*z), Q.rational(x) & Q.rational(y) & + Q.rational(z)) is False + assert satask(Q.rational(x*y*z), Q.rational(x) & Q.rational(y) & + Q.rational(z)) is True + + assert satask(Q.irrational(x + y + z), Q.rational(x) & Q.rational(y) & + Q.rational(z)) is False + assert satask(Q.rational(x + y + z), Q.rational(x) & Q.rational(y) & + Q.rational(z)) is True + + +def test_even_satask(): + assert satask(Q.even(2)) is True + assert satask(Q.even(3)) is False + + assert satask(Q.even(x*y), Q.even(x) & Q.odd(y)) is True + assert satask(Q.even(x*y), Q.even(x) & Q.integer(y)) is True + assert satask(Q.even(x*y), Q.even(x) & Q.even(y)) is True + assert satask(Q.even(x*y), Q.odd(x) & Q.odd(y)) is False + assert satask(Q.even(x*y), Q.even(x)) is None + assert satask(Q.even(x*y), Q.odd(x) & Q.integer(y)) is None + assert satask(Q.even(x*y), Q.odd(x) & Q.odd(y)) is False + + assert satask(Q.even(abs(x)), Q.even(x)) is True + assert satask(Q.even(abs(x)), Q.odd(x)) is False + assert satask(Q.even(x), Q.even(abs(x))) is None # x could be complex + + +def test_odd_satask(): + assert satask(Q.odd(2)) is False + assert satask(Q.odd(3)) is True + + assert satask(Q.odd(x*y), Q.even(x) & Q.odd(y)) is False + assert satask(Q.odd(x*y), Q.even(x) & Q.integer(y)) is False + assert satask(Q.odd(x*y), Q.even(x) & Q.even(y)) is False + assert satask(Q.odd(x*y), Q.odd(x) & Q.odd(y)) is True + assert satask(Q.odd(x*y), Q.even(x)) is None + assert satask(Q.odd(x*y), Q.odd(x) & Q.integer(y)) is None + assert satask(Q.odd(x*y), Q.odd(x) & Q.odd(y)) is True + + assert satask(Q.odd(abs(x)), Q.even(x)) is False + assert satask(Q.odd(abs(x)), Q.odd(x)) is True + assert satask(Q.odd(x), Q.odd(abs(x))) is None # x could be complex + + +def test_integer(): + assert satask(Q.integer(1)) is True + assert satask(Q.integer(S.Half)) is False + + assert satask(Q.integer(x + y), Q.integer(x) & Q.integer(y)) is True + assert satask(Q.integer(x + y), Q.integer(x)) is None + + assert satask(Q.integer(x + y), Q.integer(x) & ~Q.integer(y)) is False + assert satask(Q.integer(x + y + z), Q.integer(x) & Q.integer(y) & + ~Q.integer(z)) is False + assert satask(Q.integer(x + y + z), Q.integer(x) & ~Q.integer(y) & + ~Q.integer(z)) is None + assert satask(Q.integer(x + y + z), Q.integer(x) & ~Q.integer(y)) is None + assert satask(Q.integer(x + y), Q.integer(x) & Q.irrational(y)) is False + + assert satask(Q.integer(x*y), Q.integer(x) & Q.integer(y)) is True + assert satask(Q.integer(x*y), Q.integer(x)) is None + + assert satask(Q.integer(x*y), Q.integer(x) & ~Q.integer(y)) is None + assert satask(Q.integer(x*y), Q.integer(x) & ~Q.rational(y)) is False + assert satask(Q.integer(x*y*z), Q.integer(x) & Q.integer(y) & + ~Q.rational(z)) is False + assert satask(Q.integer(x*y*z), Q.integer(x) & ~Q.rational(y) & + ~Q.rational(z)) is None + assert satask(Q.integer(x*y*z), Q.integer(x) & ~Q.rational(y)) is None + assert satask(Q.integer(x*y), Q.integer(x) & Q.irrational(y)) is False + + +def test_abs(): + assert satask(Q.nonnegative(abs(x))) is True + assert satask(Q.positive(abs(x)), ~Q.zero(x)) is True + assert satask(Q.zero(x), ~Q.zero(abs(x))) is False + assert satask(Q.zero(x), Q.zero(abs(x))) is True + assert satask(Q.nonzero(x), ~Q.zero(abs(x))) is None # x could be complex + assert satask(Q.zero(abs(x)), Q.zero(x)) is True + + +def test_imaginary(): + assert satask(Q.imaginary(2*I)) is True + assert satask(Q.imaginary(x*y), Q.imaginary(x)) is None + assert satask(Q.imaginary(x*y), Q.imaginary(x) & Q.real(y)) is True + assert satask(Q.imaginary(x), Q.real(x)) is False + assert satask(Q.imaginary(1)) is False + assert satask(Q.imaginary(x*y), Q.real(x) & Q.real(y)) is False + assert satask(Q.imaginary(x + y), Q.real(x) & Q.real(y)) is False + + +def test_real(): + assert satask(Q.real(x*y), Q.real(x) & Q.real(y)) is True + assert satask(Q.real(x + y), Q.real(x) & Q.real(y)) is True + assert satask(Q.real(x*y*z), Q.real(x) & Q.real(y) & Q.real(z)) is True + assert satask(Q.real(x*y*z), Q.real(x) & Q.real(y)) is None + assert satask(Q.real(x*y*z), Q.real(x) & Q.real(y) & Q.imaginary(z)) is False + assert satask(Q.real(x + y + z), Q.real(x) & Q.real(y) & Q.real(z)) is True + assert satask(Q.real(x + y + z), Q.real(x) & Q.real(y)) is None + + +def test_pos_neg(): + assert satask(~Q.positive(x), Q.negative(x)) is True + assert satask(~Q.negative(x), Q.positive(x)) is True + assert satask(Q.positive(x + y), Q.positive(x) & Q.positive(y)) is True + assert satask(Q.negative(x + y), Q.negative(x) & Q.negative(y)) is True + assert satask(Q.positive(x + y), Q.negative(x) & Q.negative(y)) is False + assert satask(Q.negative(x + y), Q.positive(x) & Q.positive(y)) is False + + +def test_pow_pos_neg(): + assert satask(Q.nonnegative(x**2), Q.positive(x)) is True + assert satask(Q.nonpositive(x**2), Q.positive(x)) is False + assert satask(Q.positive(x**2), Q.positive(x)) is True + assert satask(Q.negative(x**2), Q.positive(x)) is False + assert satask(Q.real(x**2), Q.positive(x)) is True + + assert satask(Q.nonnegative(x**2), Q.negative(x)) is True + assert satask(Q.nonpositive(x**2), Q.negative(x)) is False + assert satask(Q.positive(x**2), Q.negative(x)) is True + assert satask(Q.negative(x**2), Q.negative(x)) is False + assert satask(Q.real(x**2), Q.negative(x)) is True + + assert satask(Q.nonnegative(x**2), Q.nonnegative(x)) is True + assert satask(Q.nonpositive(x**2), Q.nonnegative(x)) is None + assert satask(Q.positive(x**2), Q.nonnegative(x)) is None + assert satask(Q.negative(x**2), Q.nonnegative(x)) is False + assert satask(Q.real(x**2), Q.nonnegative(x)) is True + + assert satask(Q.nonnegative(x**2), Q.nonpositive(x)) is True + assert satask(Q.nonpositive(x**2), Q.nonpositive(x)) is None + assert satask(Q.positive(x**2), Q.nonpositive(x)) is None + assert satask(Q.negative(x**2), Q.nonpositive(x)) is False + assert satask(Q.real(x**2), Q.nonpositive(x)) is True + + assert satask(Q.nonnegative(x**3), Q.positive(x)) is True + assert satask(Q.nonpositive(x**3), Q.positive(x)) is False + assert satask(Q.positive(x**3), Q.positive(x)) is True + assert satask(Q.negative(x**3), Q.positive(x)) is False + assert satask(Q.real(x**3), Q.positive(x)) is True + + assert satask(Q.nonnegative(x**3), Q.negative(x)) is False + assert satask(Q.nonpositive(x**3), Q.negative(x)) is True + assert satask(Q.positive(x**3), Q.negative(x)) is False + assert satask(Q.negative(x**3), Q.negative(x)) is True + assert satask(Q.real(x**3), Q.negative(x)) is True + + assert satask(Q.nonnegative(x**3), Q.nonnegative(x)) is True + assert satask(Q.nonpositive(x**3), Q.nonnegative(x)) is None + assert satask(Q.positive(x**3), Q.nonnegative(x)) is None + assert satask(Q.negative(x**3), Q.nonnegative(x)) is False + assert satask(Q.real(x**3), Q.nonnegative(x)) is True + + assert satask(Q.nonnegative(x**3), Q.nonpositive(x)) is None + assert satask(Q.nonpositive(x**3), Q.nonpositive(x)) is True + assert satask(Q.positive(x**3), Q.nonpositive(x)) is False + assert satask(Q.negative(x**3), Q.nonpositive(x)) is None + assert satask(Q.real(x**3), Q.nonpositive(x)) is True + + # If x is zero, x**negative is not real. + assert satask(Q.nonnegative(x**-2), Q.nonpositive(x)) is None + assert satask(Q.nonpositive(x**-2), Q.nonpositive(x)) is None + assert satask(Q.positive(x**-2), Q.nonpositive(x)) is None + assert satask(Q.negative(x**-2), Q.nonpositive(x)) is None + assert satask(Q.real(x**-2), Q.nonpositive(x)) is None + + # We could deduce things for negative powers if x is nonzero, but it + # isn't implemented yet. + + +def test_prime_composite(): + assert satask(Q.prime(x), Q.composite(x)) is False + assert satask(Q.composite(x), Q.prime(x)) is False + assert satask(Q.composite(x), ~Q.prime(x)) is None + assert satask(Q.prime(x), ~Q.composite(x)) is None + # since 1 is neither prime nor composite the following should hold + assert satask(Q.prime(x), Q.integer(x) & Q.positive(x) & ~Q.composite(x)) is None + assert satask(Q.prime(2)) is True + assert satask(Q.prime(4)) is False + assert satask(Q.prime(1)) is False + assert satask(Q.composite(1)) is False + + +def test_extract_predargs(): + props = CNF.from_prop(Q.zero(Abs(x*y)) & Q.zero(x*y)) + assump = CNF.from_prop(Q.zero(x)) + context = CNF.from_prop(Q.zero(y)) + assert extract_predargs(props) == {Abs(x*y), x*y} + assert extract_predargs(props, assump) == {Abs(x*y), x*y, x} + assert extract_predargs(props, assump, context) == {Abs(x*y), x*y, x, y} + + props = CNF.from_prop(Eq(x, y)) + assump = CNF.from_prop(Gt(y, z)) + assert extract_predargs(props, assump) == {x, y, z} + + +def test_get_relevant_clsfacts(): + exprs = {Abs(x*y)} + exprs, facts = get_relevant_clsfacts(exprs) + assert exprs == {x*y} + assert facts.clauses == \ + {frozenset({Literal(Q.odd(Abs(x*y)), False), Literal(Q.odd(x*y), True)}), + frozenset({Literal(Q.zero(Abs(x*y)), False), Literal(Q.zero(x*y), True)}), + frozenset({Literal(Q.even(Abs(x*y)), False), Literal(Q.even(x*y), True)}), + frozenset({Literal(Q.zero(Abs(x*y)), True), Literal(Q.zero(x*y), False)}), + frozenset({Literal(Q.even(Abs(x*y)), False), + Literal(Q.odd(Abs(x*y)), False), + Literal(Q.odd(x*y), True)}), + frozenset({Literal(Q.even(Abs(x*y)), False), + Literal(Q.even(x*y), True), + Literal(Q.odd(Abs(x*y)), False)}), + frozenset({Literal(Q.positive(Abs(x*y)), False), + Literal(Q.zero(Abs(x*y)), False)})} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_sathandlers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_sathandlers.py new file mode 100644 index 0000000000000000000000000000000000000000..9d568ad8efe6ba7cf7f5eb03879ad6764c16e729 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_sathandlers.py @@ -0,0 +1,50 @@ +from sympy.assumptions.ask import Q +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.mul import Mul +from sympy.core.symbol import symbols +from sympy.logic.boolalg import (And, Or) + +from sympy.assumptions.sathandlers import (ClassFactRegistry, allargs, + anyarg, exactlyonearg,) + +x, y, z = symbols('x y z') + + +def test_class_handler_registry(): + my_handler_registry = ClassFactRegistry() + + # The predicate doesn't matter here, so just pass + @my_handler_registry.register(Mul) + def fact1(expr): + pass + @my_handler_registry.multiregister(Expr) + def fact2(expr): + pass + + assert my_handler_registry[Basic] == (frozenset(), frozenset()) + assert my_handler_registry[Expr] == (frozenset(), frozenset({fact2})) + assert my_handler_registry[Mul] == (frozenset({fact1}), frozenset({fact2})) + + +def test_allargs(): + assert allargs(x, Q.zero(x), x*y) == And(Q.zero(x), Q.zero(y)) + assert allargs(x, Q.positive(x) | Q.negative(x), x*y) == And(Q.positive(x) | Q.negative(x), Q.positive(y) | Q.negative(y)) + + +def test_anyarg(): + assert anyarg(x, Q.zero(x), x*y) == Or(Q.zero(x), Q.zero(y)) + assert anyarg(x, Q.positive(x) & Q.negative(x), x*y) == \ + Or(Q.positive(x) & Q.negative(x), Q.positive(y) & Q.negative(y)) + + +def test_exactlyonearg(): + assert exactlyonearg(x, Q.zero(x), x*y) == \ + Or(Q.zero(x) & ~Q.zero(y), Q.zero(y) & ~Q.zero(x)) + assert exactlyonearg(x, Q.zero(x), x*y*z) == \ + Or(Q.zero(x) & ~Q.zero(y) & ~Q.zero(z), Q.zero(y) + & ~Q.zero(x) & ~Q.zero(z), Q.zero(z) & ~Q.zero(x) & ~Q.zero(y)) + assert exactlyonearg(x, Q.positive(x) | Q.negative(x), x*y) == \ + Or((Q.positive(x) | Q.negative(x)) & + ~(Q.positive(y) | Q.negative(y)), (Q.positive(y) | Q.negative(y)) & + ~(Q.positive(x) | Q.negative(x))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_wrapper.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_wrapper.py new file mode 100644 index 0000000000000000000000000000000000000000..af9afd5d51fb1341e0b08149dc842b78a39c329b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/tests/test_wrapper.py @@ -0,0 +1,39 @@ +from sympy.assumptions.ask import Q +from sympy.assumptions.wrapper import (AssumptionsWrapper, is_infinite, + is_extended_real) +from sympy.core.symbol import Symbol +from sympy.core.assumptions import _assume_defined + + +def test_all_predicates(): + for fact in _assume_defined: + method_name = f'_eval_is_{fact}' + assert hasattr(AssumptionsWrapper, method_name) + + +def test_AssumptionsWrapper(): + x = Symbol('x', positive=True) + y = Symbol('y') + assert AssumptionsWrapper(x).is_positive + assert AssumptionsWrapper(y).is_positive is None + assert AssumptionsWrapper(y, Q.positive(y)).is_positive + + +def test_is_infinite(): + x = Symbol('x', infinite=True) + y = Symbol('y', infinite=False) + z = Symbol('z') + assert is_infinite(x) + assert not is_infinite(y) + assert is_infinite(z) is None + assert is_infinite(z, Q.infinite(z)) + + +def test_is_extended_real(): + x = Symbol('x', extended_real=True) + y = Symbol('y', extended_real=False) + z = Symbol('z') + assert is_extended_real(x) + assert not is_extended_real(y) + assert is_extended_real(z) is None + assert is_extended_real(z, Q.extended_real(z)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/wrapper.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/wrapper.py new file mode 100644 index 0000000000000000000000000000000000000000..cb06e9de770ed41a2b3d6fe63381ad1cb59acacc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/assumptions/wrapper.py @@ -0,0 +1,164 @@ +""" +Functions and wrapper object to call assumption property and predicate +query with same syntax. + +In SymPy, there are two assumption systems. Old assumption system is +defined in sympy/core/assumptions, and it can be accessed by attribute +such as ``x.is_even``. New assumption system is defined in +sympy/assumptions, and it can be accessed by predicates such as +``Q.even(x)``. + +Old assumption is fast, while new assumptions can freely take local facts. +In general, old assumption is used in evaluation method and new assumption +is used in refinement method. + +In most cases, both evaluation and refinement follow the same process, and +the only difference is which assumption system is used. This module provides +``is_[...]()`` functions and ``AssumptionsWrapper()`` class which allows +using two systems with same syntax so that parallel code implementation can be +avoided. + +Examples +======== + +For multiple use, use ``AssumptionsWrapper()``. + +>>> from sympy import Q, Symbol +>>> from sympy.assumptions.wrapper import AssumptionsWrapper +>>> x = Symbol('x') +>>> _x = AssumptionsWrapper(x, Q.even(x)) +>>> _x.is_integer +True +>>> _x.is_odd +False + +For single use, use ``is_[...]()`` functions. + +>>> from sympy.assumptions.wrapper import is_infinite +>>> a = Symbol('a') +>>> print(is_infinite(a)) +None +>>> is_infinite(a, Q.finite(a)) +False + +""" + +from sympy.assumptions import ask, Q +from sympy.core.basic import Basic +from sympy.core.sympify import _sympify + + +def make_eval_method(fact): + def getit(self): + pred = getattr(Q, fact) + ret = ask(pred(self.expr), self.assumptions) + return ret + return getit + + +# we subclass Basic to use the fact deduction and caching +class AssumptionsWrapper(Basic): + """ + Wrapper over ``Basic`` instances to call predicate query by + ``.is_[...]`` property + + Parameters + ========== + + expr : Basic + + assumptions : Boolean, optional + + Examples + ======== + + >>> from sympy import Q, Symbol + >>> from sympy.assumptions.wrapper import AssumptionsWrapper + >>> x = Symbol('x', even=True) + >>> AssumptionsWrapper(x).is_integer + True + >>> y = Symbol('y') + >>> AssumptionsWrapper(y, Q.even(y)).is_integer + True + + With ``AssumptionsWrapper``, both evaluation and refinement can be supported + by single implementation. + + >>> from sympy import Function + >>> class MyAbs(Function): + ... @classmethod + ... def eval(cls, x, assumptions=True): + ... _x = AssumptionsWrapper(x, assumptions) + ... if _x.is_nonnegative: + ... return x + ... if _x.is_negative: + ... return -x + ... def _eval_refine(self, assumptions): + ... return MyAbs.eval(self.args[0], assumptions) + >>> MyAbs(x) + MyAbs(x) + >>> MyAbs(x).refine(Q.positive(x)) + x + >>> MyAbs(Symbol('y', negative=True)) + -y + + """ + def __new__(cls, expr, assumptions=None): + if assumptions is None: + return expr + obj = super().__new__(cls, expr, _sympify(assumptions)) + obj.expr = expr + obj.assumptions = assumptions + return obj + + _eval_is_algebraic = make_eval_method("algebraic") + _eval_is_antihermitian = make_eval_method("antihermitian") + _eval_is_commutative = make_eval_method("commutative") + _eval_is_complex = make_eval_method("complex") + _eval_is_composite = make_eval_method("composite") + _eval_is_even = make_eval_method("even") + _eval_is_extended_negative = make_eval_method("extended_negative") + _eval_is_extended_nonnegative = make_eval_method("extended_nonnegative") + _eval_is_extended_nonpositive = make_eval_method("extended_nonpositive") + _eval_is_extended_nonzero = make_eval_method("extended_nonzero") + _eval_is_extended_positive = make_eval_method("extended_positive") + _eval_is_extended_real = make_eval_method("extended_real") + _eval_is_finite = make_eval_method("finite") + _eval_is_hermitian = make_eval_method("hermitian") + _eval_is_imaginary = make_eval_method("imaginary") + _eval_is_infinite = make_eval_method("infinite") + _eval_is_integer = make_eval_method("integer") + _eval_is_irrational = make_eval_method("irrational") + _eval_is_negative = make_eval_method("negative") + _eval_is_noninteger = make_eval_method("noninteger") + _eval_is_nonnegative = make_eval_method("nonnegative") + _eval_is_nonpositive = make_eval_method("nonpositive") + _eval_is_nonzero = make_eval_method("nonzero") + _eval_is_odd = make_eval_method("odd") + _eval_is_polar = make_eval_method("polar") + _eval_is_positive = make_eval_method("positive") + _eval_is_prime = make_eval_method("prime") + _eval_is_rational = make_eval_method("rational") + _eval_is_real = make_eval_method("real") + _eval_is_transcendental = make_eval_method("transcendental") + _eval_is_zero = make_eval_method("zero") + + +# one shot functions which are faster than AssumptionsWrapper + +def is_infinite(obj, assumptions=None): + if assumptions is None: + return obj.is_infinite + return ask(Q.infinite(obj), assumptions) + + +def is_extended_real(obj, assumptions=None): + if assumptions is None: + return obj.is_extended_real + return ask(Q.extended_real(obj), assumptions) + + +def is_extended_nonnegative(obj, assumptions=None): + if assumptions is None: + return obj.is_extended_nonnegative + return ask(Q.extended_nonnegative(obj), assumptions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..4c5007308a1b232e57f9ed164276862df0c5f265 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/__init__.py @@ -0,0 +1,33 @@ +""" +Category Theory module. + +Provides some of the fundamental category-theory-related classes, +including categories, morphisms, diagrams. Functors are not +implemented yet. + +The general reference work this module tries to follow is + + [JoyOfCats] J. Adamek, H. Herrlich. G. E. Strecker: Abstract and + Concrete Categories. The Joy of Cats. + +The latest version of this book should be available for free download +from + + katmat.math.uni-bremen.de/acc/acc.pdf + +""" + +from .baseclasses import (Object, Morphism, IdentityMorphism, + NamedMorphism, CompositeMorphism, Category, + Diagram) + +from .diagram_drawing import (DiagramGrid, XypicDiagramDrawer, + xypic_draw_diagram, preview_diagram) + +__all__ = [ + 'Object', 'Morphism', 'IdentityMorphism', 'NamedMorphism', + 'CompositeMorphism', 'Category', 'Diagram', + + 'DiagramGrid', 'XypicDiagramDrawer', 'xypic_draw_diagram', + 'preview_diagram', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/baseclasses.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/baseclasses.py new file mode 100644 index 0000000000000000000000000000000000000000..e6ab5153ae4e95f193030864c8f32a52254f2458 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/baseclasses.py @@ -0,0 +1,978 @@ +from sympy.core import S, Basic, Dict, Symbol, Tuple, sympify +from sympy.core.symbol import Str +from sympy.sets import Set, FiniteSet, EmptySet +from sympy.utilities.iterables import iterable + + +class Class(Set): + r""" + The base class for any kind of class in the set-theoretic sense. + + Explanation + =========== + + In axiomatic set theories, everything is a class. A class which + can be a member of another class is a set. A class which is not a + member of another class is a proper class. The class `\{1, 2\}` + is a set; the class of all sets is a proper class. + + This class is essentially a synonym for :class:`sympy.core.Set`. + The goal of this class is to assure easier migration to the + eventual proper implementation of set theory. + """ + is_proper = False + + +class Object(Symbol): + """ + The base class for any kind of object in an abstract category. + + Explanation + =========== + + While technically any instance of :class:`~.Basic` will do, this + class is the recommended way to create abstract objects in + abstract categories. + """ + + +class Morphism(Basic): + """ + The base class for any morphism in an abstract category. + + Explanation + =========== + + In abstract categories, a morphism is an arrow between two + category objects. The object where the arrow starts is called the + domain, while the object where the arrow ends is called the + codomain. + + Two morphisms between the same pair of objects are considered to + be the same morphisms. To distinguish between morphisms between + the same objects use :class:`NamedMorphism`. + + It is prohibited to instantiate this class. Use one of the + derived classes instead. + + See Also + ======== + + IdentityMorphism, NamedMorphism, CompositeMorphism + """ + def __new__(cls, domain, codomain): + raise(NotImplementedError( + "Cannot instantiate Morphism. Use derived classes instead.")) + + @property + def domain(self): + """ + Returns the domain of the morphism. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> f.domain + Object("A") + + """ + return self.args[0] + + @property + def codomain(self): + """ + Returns the codomain of the morphism. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> f.codomain + Object("B") + + """ + return self.args[1] + + def compose(self, other): + r""" + Composes self with the supplied morphism. + + The order of elements in the composition is the usual order, + i.e., to construct `g\circ f` use ``g.compose(f)``. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> g * f + CompositeMorphism((NamedMorphism(Object("A"), Object("B"), "f"), + NamedMorphism(Object("B"), Object("C"), "g"))) + >>> (g * f).domain + Object("A") + >>> (g * f).codomain + Object("C") + + """ + return CompositeMorphism(other, self) + + def __mul__(self, other): + r""" + Composes self with the supplied morphism. + + The semantics of this operation is given by the following + equation: ``g * f == g.compose(f)`` for composable morphisms + ``g`` and ``f``. + + See Also + ======== + + compose + """ + return self.compose(other) + + +class IdentityMorphism(Morphism): + """ + Represents an identity morphism. + + Explanation + =========== + + An identity morphism is a morphism with equal domain and codomain, + which acts as an identity with respect to composition. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, IdentityMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> id_A = IdentityMorphism(A) + >>> id_B = IdentityMorphism(B) + >>> f * id_A == f + True + >>> id_B * f == f + True + + See Also + ======== + + Morphism + """ + def __new__(cls, domain): + return Basic.__new__(cls, domain) + + @property + def codomain(self): + return self.domain + + +class NamedMorphism(Morphism): + """ + Represents a morphism which has a name. + + Explanation + =========== + + Names are used to distinguish between morphisms which have the + same domain and codomain: two named morphisms are equal if they + have the same domains, codomains, and names. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> f + NamedMorphism(Object("A"), Object("B"), "f") + >>> f.name + 'f' + + See Also + ======== + + Morphism + """ + def __new__(cls, domain, codomain, name): + if not name: + raise ValueError("Empty morphism names not allowed.") + + if not isinstance(name, Str): + name = Str(name) + + return Basic.__new__(cls, domain, codomain, name) + + @property + def name(self): + """ + Returns the name of the morphism. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> f.name + 'f' + + """ + return self.args[2].name + + +class CompositeMorphism(Morphism): + r""" + Represents a morphism which is a composition of other morphisms. + + Explanation + =========== + + Two composite morphisms are equal if the morphisms they were + obtained from (components) are the same and were listed in the + same order. + + The arguments to the constructor for this class should be listed + in diagram order: to obtain the composition `g\circ f` from the + instances of :class:`Morphism` ``g`` and ``f`` use + ``CompositeMorphism(f, g)``. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, CompositeMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> g * f + CompositeMorphism((NamedMorphism(Object("A"), Object("B"), "f"), + NamedMorphism(Object("B"), Object("C"), "g"))) + >>> CompositeMorphism(f, g) == g * f + True + + """ + @staticmethod + def _add_morphism(t, morphism): + """ + Intelligently adds ``morphism`` to tuple ``t``. + + Explanation + =========== + + If ``morphism`` is a composite morphism, its components are + added to the tuple. If ``morphism`` is an identity, nothing + is added to the tuple. + + No composability checks are performed. + """ + if isinstance(morphism, CompositeMorphism): + # ``morphism`` is a composite morphism; we have to + # denest its components. + return t + morphism.components + elif isinstance(morphism, IdentityMorphism): + # ``morphism`` is an identity. Nothing happens. + return t + else: + return t + Tuple(morphism) + + def __new__(cls, *components): + if components and not isinstance(components[0], Morphism): + # Maybe the user has explicitly supplied a list of + # morphisms. + return CompositeMorphism.__new__(cls, *components[0]) + + normalised_components = Tuple() + + for current, following in zip(components, components[1:]): + if not isinstance(current, Morphism) or \ + not isinstance(following, Morphism): + raise TypeError("All components must be morphisms.") + + if current.codomain != following.domain: + raise ValueError("Uncomposable morphisms.") + + normalised_components = CompositeMorphism._add_morphism( + normalised_components, current) + + # We haven't added the last morphism to the list of normalised + # components. Add it now. + normalised_components = CompositeMorphism._add_morphism( + normalised_components, components[-1]) + + if not normalised_components: + # If ``normalised_components`` is empty, only identities + # were supplied. Since they all were composable, they are + # all the same identities. + return components[0] + elif len(normalised_components) == 1: + # No sense to construct a whole CompositeMorphism. + return normalised_components[0] + + return Basic.__new__(cls, normalised_components) + + @property + def components(self): + """ + Returns the components of this composite morphism. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> (g * f).components + (NamedMorphism(Object("A"), Object("B"), "f"), + NamedMorphism(Object("B"), Object("C"), "g")) + + """ + return self.args[0] + + @property + def domain(self): + """ + Returns the domain of this composite morphism. + + The domain of the composite morphism is the domain of its + first component. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> (g * f).domain + Object("A") + + """ + return self.components[0].domain + + @property + def codomain(self): + """ + Returns the codomain of this composite morphism. + + The codomain of the composite morphism is the codomain of its + last component. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> (g * f).codomain + Object("C") + + """ + return self.components[-1].codomain + + def flatten(self, new_name): + """ + Forgets the composite structure of this morphism. + + Explanation + =========== + + If ``new_name`` is not empty, returns a :class:`NamedMorphism` + with the supplied name, otherwise returns a :class:`Morphism`. + In both cases the domain of the new morphism is the domain of + this composite morphism and the codomain of the new morphism + is the codomain of this composite morphism. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> (g * f).flatten("h") + NamedMorphism(Object("A"), Object("C"), "h") + + """ + return NamedMorphism(self.domain, self.codomain, new_name) + + +class Category(Basic): + r""" + An (abstract) category. + + Explanation + =========== + + A category [JoyOfCats] is a quadruple `\mbox{K} = (O, \hom, id, + \circ)` consisting of + + * a (set-theoretical) class `O`, whose members are called + `K`-objects, + + * for each pair `(A, B)` of `K`-objects, a set `\hom(A, B)` whose + members are called `K`-morphisms from `A` to `B`, + + * for a each `K`-object `A`, a morphism `id:A\rightarrow A`, + called the `K`-identity of `A`, + + * a composition law `\circ` associating with every `K`-morphisms + `f:A\rightarrow B` and `g:B\rightarrow C` a `K`-morphism `g\circ + f:A\rightarrow C`, called the composite of `f` and `g`. + + Composition is associative, `K`-identities are identities with + respect to composition, and the sets `\hom(A, B)` are pairwise + disjoint. + + This class knows nothing about its objects and morphisms. + Concrete cases of (abstract) categories should be implemented as + classes derived from this one. + + Certain instances of :class:`Diagram` can be asserted to be + commutative in a :class:`Category` by supplying the argument + ``commutative_diagrams`` in the constructor. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram, Category + >>> from sympy import FiniteSet + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> K = Category("K", commutative_diagrams=[d]) + >>> K.commutative_diagrams == FiniteSet(d) + True + + See Also + ======== + + Diagram + """ + def __new__(cls, name, objects=EmptySet, commutative_diagrams=EmptySet): + if not name: + raise ValueError("A Category cannot have an empty name.") + + if not isinstance(name, Str): + name = Str(name) + + if not isinstance(objects, Class): + objects = Class(objects) + + new_category = Basic.__new__(cls, name, objects, + FiniteSet(*commutative_diagrams)) + return new_category + + @property + def name(self): + """ + Returns the name of this category. + + Examples + ======== + + >>> from sympy.categories import Category + >>> K = Category("K") + >>> K.name + 'K' + + """ + return self.args[0].name + + @property + def objects(self): + """ + Returns the class of objects of this category. + + Examples + ======== + + >>> from sympy.categories import Object, Category + >>> from sympy import FiniteSet + >>> A = Object("A") + >>> B = Object("B") + >>> K = Category("K", FiniteSet(A, B)) + >>> K.objects + Class({Object("A"), Object("B")}) + + """ + return self.args[1] + + @property + def commutative_diagrams(self): + """ + Returns the :class:`~.FiniteSet` of diagrams which are known to + be commutative in this category. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram, Category + >>> from sympy import FiniteSet + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> K = Category("K", commutative_diagrams=[d]) + >>> K.commutative_diagrams == FiniteSet(d) + True + + """ + return self.args[2] + + def hom(self, A, B): + raise NotImplementedError( + "hom-sets are not implemented in Category.") + + def all_morphisms(self): + raise NotImplementedError( + "Obtaining the class of morphisms is not implemented in Category.") + + +class Diagram(Basic): + r""" + Represents a diagram in a certain category. + + Explanation + =========== + + Informally, a diagram is a collection of objects of a category and + certain morphisms between them. A diagram is still a monoid with + respect to morphism composition; i.e., identity morphisms, as well + as all composites of morphisms included in the diagram belong to + the diagram. For a more formal approach to this notion see + [Pare1970]. + + The components of composite morphisms are also added to the + diagram. No properties are assigned to such morphisms by default. + + A commutative diagram is often accompanied by a statement of the + following kind: "if such morphisms with such properties exist, + then such morphisms which such properties exist and the diagram is + commutative". To represent this, an instance of :class:`Diagram` + includes a collection of morphisms which are the premises and + another collection of conclusions. ``premises`` and + ``conclusions`` associate morphisms belonging to the corresponding + categories with the :class:`~.FiniteSet`'s of their properties. + + The set of properties of a composite morphism is the intersection + of the sets of properties of its components. The domain and + codomain of a conclusion morphism should be among the domains and + codomains of the morphisms listed as the premises of a diagram. + + No checks are carried out of whether the supplied object and + morphisms do belong to one and the same category. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram + >>> from sympy import pprint, default_sort_key + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> premises_keys = sorted(d.premises.keys(), key=default_sort_key) + >>> pprint(premises_keys, use_unicode=False) + [g*f:A-->C, id:A-->A, id:B-->B, id:C-->C, f:A-->B, g:B-->C] + >>> pprint(d.premises, use_unicode=False) + {g*f:A-->C: EmptySet, id:A-->A: EmptySet, id:B-->B: EmptySet, + id:C-->C: EmptySet, f:A-->B: EmptySet, g:B-->C: EmptySet} + >>> d = Diagram([f, g], {g * f: "unique"}) + >>> pprint(d.conclusions,use_unicode=False) + {g*f:A-->C: {unique}} + + References + ========== + + [Pare1970] B. Pareigis: Categories and functors. Academic Press, 1970. + + """ + @staticmethod + def _set_dict_union(dictionary, key, value): + """ + If ``key`` is in ``dictionary``, set the new value of ``key`` + to be the union between the old value and ``value``. + Otherwise, set the value of ``key`` to ``value. + + Returns ``True`` if the key already was in the dictionary and + ``False`` otherwise. + """ + if key in dictionary: + dictionary[key] = dictionary[key] | value + return True + else: + dictionary[key] = value + return False + + @staticmethod + def _add_morphism_closure(morphisms, morphism, props, add_identities=True, + recurse_composites=True): + """ + Adds a morphism and its attributes to the supplied dictionary + ``morphisms``. If ``add_identities`` is True, also adds the + identity morphisms for the domain and the codomain of + ``morphism``. + """ + if not Diagram._set_dict_union(morphisms, morphism, props): + # We have just added a new morphism. + + if isinstance(morphism, IdentityMorphism): + if props: + # Properties for identity morphisms don't really + # make sense, because very much is known about + # identity morphisms already, so much that they + # are trivial. Having properties for identity + # morphisms would only be confusing. + raise ValueError( + "Instances of IdentityMorphism cannot have properties.") + return + + if add_identities: + empty = EmptySet + + id_dom = IdentityMorphism(morphism.domain) + id_cod = IdentityMorphism(morphism.codomain) + + Diagram._set_dict_union(morphisms, id_dom, empty) + Diagram._set_dict_union(morphisms, id_cod, empty) + + for existing_morphism, existing_props in list(morphisms.items()): + new_props = existing_props & props + if morphism.domain == existing_morphism.codomain: + left = morphism * existing_morphism + Diagram._set_dict_union(morphisms, left, new_props) + if morphism.codomain == existing_morphism.domain: + right = existing_morphism * morphism + Diagram._set_dict_union(morphisms, right, new_props) + + if isinstance(morphism, CompositeMorphism) and recurse_composites: + # This is a composite morphism, add its components as + # well. + empty = EmptySet + for component in morphism.components: + Diagram._add_morphism_closure(morphisms, component, empty, + add_identities) + + def __new__(cls, *args): + """ + Construct a new instance of Diagram. + + Explanation + =========== + + If no arguments are supplied, an empty diagram is created. + + If at least an argument is supplied, ``args[0]`` is + interpreted as the premises of the diagram. If ``args[0]`` is + a list, it is interpreted as a list of :class:`Morphism`'s, in + which each :class:`Morphism` has an empty set of properties. + If ``args[0]`` is a Python dictionary or a :class:`Dict`, it + is interpreted as a dictionary associating to some + :class:`Morphism`'s some properties. + + If at least two arguments are supplied ``args[1]`` is + interpreted as the conclusions of the diagram. The type of + ``args[1]`` is interpreted in exactly the same way as the type + of ``args[0]``. If only one argument is supplied, the diagram + has no conclusions. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> from sympy.categories import IdentityMorphism, Diagram + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> IdentityMorphism(A) in d.premises.keys() + True + >>> g * f in d.premises.keys() + True + >>> d = Diagram([f, g], {g * f: "unique"}) + >>> d.conclusions[g * f] + {unique} + + """ + premises = {} + conclusions = {} + + # Here we will keep track of the objects which appear in the + # premises. + objects = EmptySet + + if len(args) >= 1: + # We've got some premises in the arguments. + premises_arg = args[0] + + if isinstance(premises_arg, list): + # The user has supplied a list of morphisms, none of + # which have any attributes. + empty = EmptySet + + for morphism in premises_arg: + objects |= FiniteSet(morphism.domain, morphism.codomain) + Diagram._add_morphism_closure(premises, morphism, empty) + elif isinstance(premises_arg, (dict, Dict)): + # The user has supplied a dictionary of morphisms and + # their properties. + for morphism, props in premises_arg.items(): + objects |= FiniteSet(morphism.domain, morphism.codomain) + Diagram._add_morphism_closure( + premises, morphism, FiniteSet(*props) if iterable(props) else FiniteSet(props)) + + if len(args) >= 2: + # We also have some conclusions. + conclusions_arg = args[1] + + if isinstance(conclusions_arg, list): + # The user has supplied a list of morphisms, none of + # which have any attributes. + empty = EmptySet + + for morphism in conclusions_arg: + # Check that no new objects appear in conclusions. + if ((sympify(objects.contains(morphism.domain)) is S.true) and + (sympify(objects.contains(morphism.codomain)) is S.true)): + # No need to add identities and recurse + # composites this time. + Diagram._add_morphism_closure( + conclusions, morphism, empty, add_identities=False, + recurse_composites=False) + elif isinstance(conclusions_arg, (dict, Dict)): + # The user has supplied a dictionary of morphisms and + # their properties. + for morphism, props in conclusions_arg.items(): + # Check that no new objects appear in conclusions. + if (morphism.domain in objects) and \ + (morphism.codomain in objects): + # No need to add identities and recurse + # composites this time. + Diagram._add_morphism_closure( + conclusions, morphism, FiniteSet(*props) if iterable(props) else FiniteSet(props), + add_identities=False, recurse_composites=False) + + return Basic.__new__(cls, Dict(premises), Dict(conclusions), objects) + + @property + def premises(self): + """ + Returns the premises of this diagram. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> from sympy.categories import IdentityMorphism, Diagram + >>> from sympy import pretty + >>> A = Object("A") + >>> B = Object("B") + >>> f = NamedMorphism(A, B, "f") + >>> id_A = IdentityMorphism(A) + >>> id_B = IdentityMorphism(B) + >>> d = Diagram([f]) + >>> print(pretty(d.premises, use_unicode=False)) + {id:A-->A: EmptySet, id:B-->B: EmptySet, f:A-->B: EmptySet} + + """ + return self.args[0] + + @property + def conclusions(self): + """ + Returns the conclusions of this diagram. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism + >>> from sympy.categories import IdentityMorphism, Diagram + >>> from sympy import FiniteSet + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> IdentityMorphism(A) in d.premises.keys() + True + >>> g * f in d.premises.keys() + True + >>> d = Diagram([f, g], {g * f: "unique"}) + >>> d.conclusions[g * f] == FiniteSet("unique") + True + + """ + return self.args[1] + + @property + def objects(self): + """ + Returns the :class:`~.FiniteSet` of objects that appear in this + diagram. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g]) + >>> d.objects + {Object("A"), Object("B"), Object("C")} + + """ + return self.args[2] + + def hom(self, A, B): + """ + Returns a 2-tuple of sets of morphisms between objects ``A`` and + ``B``: one set of morphisms listed as premises, and the other set + of morphisms listed as conclusions. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram + >>> from sympy import pretty + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g], {g * f: "unique"}) + >>> print(pretty(d.hom(A, C), use_unicode=False)) + ({g*f:A-->C}, {g*f:A-->C}) + + See Also + ======== + Object, Morphism + """ + premises = EmptySet + conclusions = EmptySet + + for morphism in self.premises.keys(): + if (morphism.domain == A) and (morphism.codomain == B): + premises |= FiniteSet(morphism) + for morphism in self.conclusions.keys(): + if (morphism.domain == A) and (morphism.codomain == B): + conclusions |= FiniteSet(morphism) + + return (premises, conclusions) + + def is_subdiagram(self, diagram): + """ + Checks whether ``diagram`` is a subdiagram of ``self``. + Diagram `D'` is a subdiagram of `D` if all premises + (conclusions) of `D'` are contained in the premises + (conclusions) of `D`. The morphisms contained + both in `D'` and `D` should have the same properties for `D'` + to be a subdiagram of `D`. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g], {g * f: "unique"}) + >>> d1 = Diagram([f]) + >>> d.is_subdiagram(d1) + True + >>> d1.is_subdiagram(d) + False + """ + premises = all((m in self.premises) and + (diagram.premises[m] == self.premises[m]) + for m in diagram.premises) + if not premises: + return False + + conclusions = all((m in self.conclusions) and + (diagram.conclusions[m] == self.conclusions[m]) + for m in diagram.conclusions) + + # Premises is surely ``True`` here. + return conclusions + + def subdiagram_from_objects(self, objects): + """ + If ``objects`` is a subset of the objects of ``self``, returns + a diagram which has as premises all those premises of ``self`` + which have a domains and codomains in ``objects``, likewise + for conclusions. Properties are preserved. + + Examples + ======== + + >>> from sympy.categories import Object, NamedMorphism, Diagram + >>> from sympy import FiniteSet + >>> A = Object("A") + >>> B = Object("B") + >>> C = Object("C") + >>> f = NamedMorphism(A, B, "f") + >>> g = NamedMorphism(B, C, "g") + >>> d = Diagram([f, g], {f: "unique", g*f: "veryunique"}) + >>> d1 = d.subdiagram_from_objects(FiniteSet(A, B)) + >>> d1 == Diagram([f], {f: "unique"}) + True + """ + if not objects.is_subset(self.objects): + raise ValueError( + "Supplied objects should all belong to the diagram.") + + new_premises = {} + for morphism, props in self.premises.items(): + if ((sympify(objects.contains(morphism.domain)) is S.true) and + (sympify(objects.contains(morphism.codomain)) is S.true)): + new_premises[morphism] = props + + new_conclusions = {} + for morphism, props in self.conclusions.items(): + if ((sympify(objects.contains(morphism.domain)) is S.true) and + (sympify(objects.contains(morphism.codomain)) is S.true)): + new_conclusions[morphism] = props + + return Diagram(new_premises, new_conclusions) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/categories/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py new file mode 100644 index 0000000000000000000000000000000000000000..ab3f62880445c5deb526797ee0623fe3510bcbc3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py @@ -0,0 +1,825 @@ +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.coset_table import (CosetTable, + coset_enumeration_r, coset_enumeration_c) +from sympy.combinatorics.coset_table import modified_coset_enumeration_r +from sympy.combinatorics.free_groups import free_group + +from sympy.testing.pytest import slow + +""" +References +========== + +[1] Holt, D., Eick, B., O'Brien, E. +"Handbook of Computational Group Theory" + +[2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson +Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. +"Implementation and Analysis of the Todd-Coxeter Algorithm" + +""" + +def test_scan_1(): + # Example 5.1 from [1] + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + c = CosetTable(f, [x]) + + c.scan_and_fill(0, x) + assert c.table == [[0, 0, None, None]] + assert c.p == [0] + assert c.n == 1 + assert c.omega == [0] + + c.scan_and_fill(0, x**3) + assert c.table == [[0, 0, None, None]] + assert c.p == [0] + assert c.n == 1 + assert c.omega == [0] + + c.scan_and_fill(0, y**3) + assert c.table == [[0, 0, 1, 2], [None, None, 2, 0], [None, None, 0, 1]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(0, x**-1*y**-1*x*y) + assert c.table == [[0, 0, 1, 2], [None, None, 2, 0], [2, 2, 0, 1]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, x**3) + assert c.table == [[0, 0, 1, 2], [3, 4, 2, 0], [2, 2, 0, 1], \ + [4, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(1, y**3) + assert c.table == [[0, 0, 1, 2], [3, 4, 2, 0], [2, 2, 0, 1], \ + [4, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(1, x**-1*y**-1*x*y) + assert c.table == [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1], \ + [None, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 1, 1] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + # Example 5.2 from [1] + f = FpGroup(F, [x**2, y**3, (x*y)**3]) + c = CosetTable(f, [x*y]) + + c.scan_and_fill(0, x*y) + assert c.table == [[1, None, None, 1], [None, 0, 0, None]] + assert c.p == [0, 1] + assert c.n == 2 + assert c.omega == [0, 1] + + c.scan_and_fill(0, x**2) + assert c.table == [[1, 1, None, 1], [0, 0, 0, None]] + assert c.p == [0, 1] + assert c.n == 2 + assert c.omega == [0, 1] + + c.scan_and_fill(0, y**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(0, (x*y)**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, x**2) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, y**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, (x*y)**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [3, 4, 1, 0], [None, 2, 4, None], [2, None, None, 3]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(2, x**2) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [3, 3, 1, 0], [2, 2, 3, 3], [2, None, None, 3]] + assert c.p == [0, 1, 2, 3, 3] + assert c.n == 4 + assert c.omega == [0, 1, 2, 3] + + +@slow +def test_coset_enumeration(): + # this test function contains the combined tests for the two strategies + # i.e. HLT and Felsch strategies. + + # Example 5.1 from [1] + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + C_r = coset_enumeration_r(f, [x]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(f, [x]) + C_c.compress(); C_c.standardize() + table1 = [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] + assert C_r.table == table1 + assert C_c.table == table1 + + # E1 from [2] Pg. 474 + F, r, s, t = free_group("r, s, t") + E1 = FpGroup(F, [t**-1*r*t*r**-2, r**-1*s*r*s**-2, s**-1*t*s*t**-2]) + C_r = coset_enumeration_r(E1, []) + C_r.compress() + C_c = coset_enumeration_c(E1, []) + C_c.compress() + table2 = [[0, 0, 0, 0, 0, 0]] + assert C_r.table == table2 + # test for issue #11449 + assert C_c.table == table2 + + # Cox group from [2] Pg. 474 + F, a, b = free_group("a, b") + Cox = FpGroup(F, [a**6, b**6, (a*b)**2, (a**2*b**2)**2, (a**3*b**3)**5]) + C_r = coset_enumeration_r(Cox, [a]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(Cox, [a]) + C_c.compress(); C_c.standardize() + table3 = [[0, 0, 1, 2], + [2, 3, 4, 0], + [5, 1, 0, 6], + [1, 7, 8, 9], + [9, 10, 11, 1], + [12, 2, 9, 13], + [14, 9, 2, 11], + [3, 12, 15, 16], + [16, 17, 18, 3], + [6, 4, 3, 5], + [4, 19, 20, 21], + [21, 22, 6, 4], + [7, 5, 23, 24], + [25, 23, 5, 18], + [19, 6, 22, 26], + [24, 27, 28, 7], + [29, 8, 7, 30], + [8, 31, 32, 33], + [33, 34, 13, 8], + [10, 14, 35, 35], + [35, 36, 37, 10], + [30, 11, 10, 29], + [11, 38, 39, 14], + [13, 39, 38, 12], + [40, 15, 12, 41], + [42, 13, 34, 43], + [44, 35, 14, 45], + [15, 46, 47, 34], + [34, 48, 49, 15], + [50, 16, 21, 51], + [52, 21, 16, 49], + [17, 50, 53, 54], + [54, 55, 56, 17], + [41, 18, 17, 40], + [18, 28, 27, 25], + [26, 20, 19, 19], + [20, 57, 58, 59], + [59, 60, 51, 20], + [22, 52, 61, 23], + [23, 62, 63, 22], + [64, 24, 33, 65], + [48, 33, 24, 61], + [62, 25, 54, 66], + [67, 54, 25, 68], + [57, 26, 59, 69], + [70, 59, 26, 63], + [27, 64, 71, 72], + [72, 73, 68, 27], + [28, 41, 74, 75], + [75, 76, 30, 28], + [31, 29, 77, 78], + [79, 77, 29, 37], + [38, 30, 76, 80], + [78, 81, 82, 31], + [43, 32, 31, 42], + [32, 83, 84, 85], + [85, 86, 65, 32], + [36, 44, 87, 88], + [88, 89, 90, 36], + [45, 37, 36, 44], + [37, 82, 81, 79], + [80, 74, 41, 38], + [39, 42, 91, 92], + [92, 93, 45, 39], + [46, 40, 94, 95], + [96, 94, 40, 56], + [97, 91, 42, 82], + [83, 43, 98, 99], + [100, 98, 43, 47], + [101, 87, 44, 90], + [82, 45, 93, 97], + [95, 102, 103, 46], + [104, 47, 46, 105], + [47, 106, 107, 100], + [61, 108, 109, 48], + [105, 49, 48, 104], + [49, 110, 111, 52], + [51, 111, 110, 50], + [112, 53, 50, 113], + [114, 51, 60, 115], + [116, 61, 52, 117], + [53, 118, 119, 60], + [60, 70, 66, 53], + [55, 67, 120, 121], + [121, 122, 123, 55], + [113, 56, 55, 112], + [56, 103, 102, 96], + [69, 124, 125, 57], + [115, 58, 57, 114], + [58, 126, 127, 128], + [128, 128, 69, 58], + [66, 129, 130, 62], + [117, 63, 62, 116], + [63, 125, 124, 70], + [65, 109, 108, 64], + [131, 71, 64, 132], + [133, 65, 86, 134], + [135, 66, 70, 136], + [68, 130, 129, 67], + [137, 120, 67, 138], + [132, 68, 73, 131], + [139, 69, 128, 140], + [71, 141, 142, 86], + [86, 143, 144, 71], + [145, 72, 75, 146], + [147, 75, 72, 144], + [73, 145, 148, 120], + [120, 149, 150, 73], + [74, 151, 152, 94], + [94, 153, 146, 74], + [76, 147, 154, 77], + [77, 155, 156, 76], + [157, 78, 85, 158], + [143, 85, 78, 154], + [155, 79, 88, 159], + [160, 88, 79, 161], + [151, 80, 92, 162], + [163, 92, 80, 156], + [81, 157, 164, 165], + [165, 166, 161, 81], + [99, 107, 106, 83], + [134, 84, 83, 133], + [84, 167, 168, 169], + [169, 170, 158, 84], + [87, 171, 172, 93], + [93, 163, 159, 87], + [89, 160, 173, 174], + [174, 175, 176, 89], + [90, 90, 89, 101], + [91, 177, 178, 98], + [98, 179, 162, 91], + [180, 95, 100, 181], + [179, 100, 95, 152], + [153, 96, 121, 148], + [182, 121, 96, 183], + [177, 97, 165, 184], + [185, 165, 97, 172], + [186, 99, 169, 187], + [188, 169, 99, 178], + [171, 101, 174, 189], + [190, 174, 101, 176], + [102, 180, 191, 192], + [192, 193, 183, 102], + [103, 113, 194, 195], + [195, 196, 105, 103], + [106, 104, 197, 198], + [199, 197, 104, 109], + [110, 105, 196, 200], + [198, 201, 133, 106], + [107, 186, 202, 203], + [203, 204, 181, 107], + [108, 116, 205, 206], + [206, 207, 132, 108], + [109, 133, 201, 199], + [200, 194, 113, 110], + [111, 114, 208, 209], + [209, 210, 117, 111], + [118, 112, 211, 212], + [213, 211, 112, 123], + [214, 208, 114, 125], + [126, 115, 215, 216], + [217, 215, 115, 119], + [218, 205, 116, 130], + [125, 117, 210, 214], + [212, 219, 220, 118], + [136, 119, 118, 135], + [119, 221, 222, 217], + [122, 182, 223, 224], + [224, 225, 226, 122], + [138, 123, 122, 137], + [123, 220, 219, 213], + [124, 139, 227, 228], + [228, 229, 136, 124], + [216, 222, 221, 126], + [140, 127, 126, 139], + [127, 230, 231, 232], + [232, 233, 140, 127], + [129, 135, 234, 235], + [235, 236, 138, 129], + [130, 132, 207, 218], + [141, 131, 237, 238], + [239, 237, 131, 150], + [167, 134, 240, 241], + [242, 240, 134, 142], + [243, 234, 135, 220], + [221, 136, 229, 244], + [149, 137, 245, 246], + [247, 245, 137, 226], + [220, 138, 236, 243], + [244, 227, 139, 221], + [230, 140, 233, 248], + [238, 249, 250, 141], + [251, 142, 141, 252], + [142, 253, 254, 242], + [154, 255, 256, 143], + [252, 144, 143, 251], + [144, 257, 258, 147], + [146, 258, 257, 145], + [259, 148, 145, 260], + [261, 146, 153, 262], + [263, 154, 147, 264], + [148, 265, 266, 153], + [246, 267, 268, 149], + [260, 150, 149, 259], + [150, 250, 249, 239], + [162, 269, 270, 151], + [262, 152, 151, 261], + [152, 271, 272, 179], + [159, 273, 274, 155], + [264, 156, 155, 263], + [156, 270, 269, 163], + [158, 256, 255, 157], + [275, 164, 157, 276], + [277, 158, 170, 278], + [279, 159, 163, 280], + [161, 274, 273, 160], + [281, 173, 160, 282], + [276, 161, 166, 275], + [283, 162, 179, 284], + [164, 285, 286, 170], + [170, 188, 184, 164], + [166, 185, 189, 173], + [173, 287, 288, 166], + [241, 254, 253, 167], + [278, 168, 167, 277], + [168, 289, 290, 291], + [291, 292, 187, 168], + [189, 293, 294, 171], + [280, 172, 171, 279], + [172, 295, 296, 185], + [175, 190, 297, 297], + [297, 298, 299, 175], + [282, 176, 175, 281], + [176, 294, 293, 190], + [184, 296, 295, 177], + [284, 178, 177, 283], + [178, 300, 301, 188], + [181, 272, 271, 180], + [302, 191, 180, 303], + [304, 181, 204, 305], + [183, 266, 265, 182], + [306, 223, 182, 307], + [303, 183, 193, 302], + [308, 184, 188, 309], + [310, 189, 185, 311], + [187, 301, 300, 186], + [305, 202, 186, 304], + [312, 187, 292, 313], + [314, 297, 190, 315], + [191, 316, 317, 204], + [204, 318, 319, 191], + [320, 192, 195, 321], + [322, 195, 192, 319], + [193, 320, 323, 223], + [223, 324, 325, 193], + [194, 326, 327, 211], + [211, 328, 321, 194], + [196, 322, 329, 197], + [197, 330, 331, 196], + [332, 198, 203, 333], + [318, 203, 198, 329], + [330, 199, 206, 334], + [335, 206, 199, 336], + [326, 200, 209, 337], + [338, 209, 200, 331], + [201, 332, 339, 240], + [240, 340, 336, 201], + [202, 341, 342, 292], + [292, 343, 333, 202], + [205, 344, 345, 210], + [210, 338, 334, 205], + [207, 335, 346, 237], + [237, 347, 348, 207], + [208, 349, 350, 215], + [215, 351, 337, 208], + [352, 212, 217, 353], + [351, 217, 212, 327], + [328, 213, 224, 323], + [354, 224, 213, 355], + [349, 214, 228, 356], + [357, 228, 214, 345], + [358, 216, 232, 359], + [360, 232, 216, 350], + [344, 218, 235, 361], + [362, 235, 218, 348], + [219, 352, 363, 364], + [364, 365, 355, 219], + [222, 358, 366, 367], + [367, 368, 353, 222], + [225, 354, 369, 370], + [370, 371, 372, 225], + [307, 226, 225, 306], + [226, 268, 267, 247], + [227, 373, 374, 233], + [233, 360, 356, 227], + [229, 357, 361, 234], + [234, 375, 376, 229], + [248, 231, 230, 230], + [231, 377, 378, 379], + [379, 380, 359, 231], + [236, 362, 381, 245], + [245, 382, 383, 236], + [384, 238, 242, 385], + [340, 242, 238, 346], + [347, 239, 246, 381], + [386, 246, 239, 387], + [388, 241, 291, 389], + [343, 291, 241, 339], + [375, 243, 364, 390], + [391, 364, 243, 383], + [373, 244, 367, 392], + [393, 367, 244, 376], + [382, 247, 370, 394], + [395, 370, 247, 396], + [377, 248, 379, 397], + [398, 379, 248, 374], + [249, 384, 399, 400], + [400, 401, 387, 249], + [250, 260, 402, 403], + [403, 404, 252, 250], + [253, 251, 405, 406], + [407, 405, 251, 256], + [257, 252, 404, 408], + [406, 409, 277, 253], + [254, 388, 410, 411], + [411, 412, 385, 254], + [255, 263, 413, 414], + [414, 415, 276, 255], + [256, 277, 409, 407], + [408, 402, 260, 257], + [258, 261, 416, 417], + [417, 418, 264, 258], + [265, 259, 419, 420], + [421, 419, 259, 268], + [422, 416, 261, 270], + [271, 262, 423, 424], + [425, 423, 262, 266], + [426, 413, 263, 274], + [270, 264, 418, 422], + [420, 427, 307, 265], + [266, 303, 428, 425], + [267, 386, 429, 430], + [430, 431, 396, 267], + [268, 307, 427, 421], + [269, 283, 432, 433], + [433, 434, 280, 269], + [424, 428, 303, 271], + [272, 304, 435, 436], + [436, 437, 284, 272], + [273, 279, 438, 439], + [439, 440, 282, 273], + [274, 276, 415, 426], + [285, 275, 441, 442], + [443, 441, 275, 288], + [289, 278, 444, 445], + [446, 444, 278, 286], + [447, 438, 279, 294], + [295, 280, 434, 448], + [287, 281, 449, 450], + [451, 449, 281, 299], + [294, 282, 440, 447], + [448, 432, 283, 295], + [300, 284, 437, 452], + [442, 453, 454, 285], + [309, 286, 285, 308], + [286, 455, 456, 446], + [450, 457, 458, 287], + [311, 288, 287, 310], + [288, 454, 453, 443], + [445, 456, 455, 289], + [313, 290, 289, 312], + [290, 459, 460, 461], + [461, 462, 389, 290], + [293, 310, 463, 464], + [464, 465, 315, 293], + [296, 308, 466, 467], + [467, 468, 311, 296], + [298, 314, 469, 470], + [470, 471, 472, 298], + [315, 299, 298, 314], + [299, 458, 457, 451], + [452, 435, 304, 300], + [301, 312, 473, 474], + [474, 475, 309, 301], + [316, 302, 476, 477], + [478, 476, 302, 325], + [341, 305, 479, 480], + [481, 479, 305, 317], + [324, 306, 482, 483], + [484, 482, 306, 372], + [485, 466, 308, 454], + [455, 309, 475, 486], + [487, 463, 310, 458], + [454, 311, 468, 485], + [486, 473, 312, 455], + [459, 313, 488, 489], + [490, 488, 313, 342], + [491, 469, 314, 472], + [458, 315, 465, 487], + [477, 492, 485, 316], + [463, 317, 316, 468], + [317, 487, 493, 481], + [329, 447, 464, 318], + [468, 319, 318, 463], + [319, 467, 448, 322], + [321, 448, 467, 320], + [475, 323, 320, 466], + [432, 321, 328, 437], + [438, 329, 322, 434], + [323, 474, 452, 328], + [483, 494, 486, 324], + [466, 325, 324, 475], + [325, 485, 492, 478], + [337, 422, 433, 326], + [437, 327, 326, 432], + [327, 436, 424, 351], + [334, 426, 439, 330], + [434, 331, 330, 438], + [331, 433, 422, 338], + [333, 464, 447, 332], + [449, 339, 332, 440], + [465, 333, 343, 469], + [413, 334, 338, 418], + [336, 439, 426, 335], + [441, 346, 335, 415], + [440, 336, 340, 449], + [416, 337, 351, 423], + [339, 451, 470, 343], + [346, 443, 450, 340], + [480, 493, 487, 341], + [469, 342, 341, 465], + [342, 491, 495, 490], + [361, 407, 414, 344], + [418, 345, 344, 413], + [345, 417, 408, 357], + [381, 446, 442, 347], + [415, 348, 347, 441], + [348, 414, 407, 362], + [356, 408, 417, 349], + [423, 350, 349, 416], + [350, 425, 420, 360], + [353, 424, 436, 352], + [479, 363, 352, 435], + [428, 353, 368, 476], + [355, 452, 474, 354], + [488, 369, 354, 473], + [435, 355, 365, 479], + [402, 356, 360, 419], + [405, 361, 357, 404], + [359, 420, 425, 358], + [476, 366, 358, 428], + [427, 359, 380, 482], + [444, 381, 362, 409], + [363, 481, 477, 368], + [368, 393, 390, 363], + [365, 391, 394, 369], + [369, 490, 480, 365], + [366, 478, 483, 380], + [380, 398, 392, 366], + [371, 395, 496, 497], + [497, 498, 489, 371], + [473, 372, 371, 488], + [372, 486, 494, 484], + [392, 400, 403, 373], + [419, 374, 373, 402], + [374, 421, 430, 398], + [390, 411, 406, 375], + [404, 376, 375, 405], + [376, 403, 400, 393], + [397, 430, 421, 377], + [482, 378, 377, 427], + [378, 484, 497, 499], + [499, 499, 397, 378], + [394, 461, 445, 382], + [409, 383, 382, 444], + [383, 406, 411, 391], + [385, 450, 443, 384], + [492, 399, 384, 453], + [457, 385, 412, 493], + [387, 442, 446, 386], + [494, 429, 386, 456], + [453, 387, 401, 492], + [389, 470, 451, 388], + [493, 410, 388, 457], + [471, 389, 462, 495], + [412, 390, 393, 399], + [462, 394, 391, 410], + [401, 392, 398, 429], + [396, 445, 461, 395], + [498, 496, 395, 460], + [456, 396, 431, 494], + [431, 397, 499, 496], + [399, 477, 481, 412], + [429, 483, 478, 401], + [410, 480, 490, 462], + [496, 497, 484, 431], + [489, 495, 491, 459], + [495, 460, 459, 471], + [460, 489, 498, 498], + [472, 472, 471, 491]] + + assert C_r.table == table3 + assert C_c.table == table3 + + # Group denoted by B2,4 from [2] Pg. 474 + F, a, b = free_group("a, b") + B_2_4 = FpGroup(F, [a**4, b**4, (a*b)**4, (a**-1*b)**4, (a**2*b)**4, \ + (a*b**2)**4, (a**2*b**2)**4, (a**-1*b*a*b)**4, (a*b**-1*a*b)**4]) + C_r = coset_enumeration_r(B_2_4, [a]) + C_c = coset_enumeration_c(B_2_4, [a]) + index_r = 0 + for i in range(len(C_r.p)): + if C_r.p[i] == i: + index_r += 1 + assert index_r == 1024 + + index_c = 0 + for i in range(len(C_c.p)): + if C_c.p[i] == i: + index_c += 1 + assert index_c == 1024 + + # trivial Macdonald group G(2,2) from [2] Pg. 480 + M = FpGroup(F, [b**-1*a**-1*b*a*b**-1*a*b*a**-2, a**-1*b**-1*a*b*a**-1*b*a*b**-2]) + C_r = coset_enumeration_r(M, [a]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(M, [a]) + C_c.compress(); C_c.standardize() + table4 = [[0, 0, 0, 0]] + assert C_r.table == table4 + assert C_c.table == table4 + + +def test_look_ahead(): + # Section 3.2 [Test Example] Example (d) from [2] + F, a, b, c = free_group("a, b, c") + f = FpGroup(F, [a**11, b**5, c**4, (a*c)**3, b**2*c**-1*b**-1*c, a**4*b**-1*a**-1*b]) + H = [c, b, c**2] + table0 = [[1, 2, 0, 0, 0, 0], + [3, 0, 4, 5, 6, 7], + [0, 8, 9, 10, 11, 12], + [5, 1, 10, 13, 14, 15], + [16, 5, 16, 1, 17, 18], + [4, 3, 1, 8, 19, 20], + [12, 21, 22, 23, 24, 1], + [25, 26, 27, 28, 1, 24], + [2, 10, 5, 16, 22, 28], + [10, 13, 13, 2, 29, 30]] + CosetTable.max_stack_size = 10 + C_c = coset_enumeration_c(f, H) + C_c.compress(); C_c.standardize() + assert C_c.table[: 10] == table0 + +def test_modified_methods(): + ''' + Tests for modified coset table methods. + Example 5.7 from [1] Holt, D., Eick, B., O'Brien + "Handbook of Computational Group Theory". + + ''' + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**5, (x*y)**2]) + H = [x*y, x**-1*y**-1*x*y*x] + C = CosetTable(f, H) + C.modified_define(0, x) + identity = C._grp.identity + a_0 = C._grp.generators[0] + a_1 = C._grp.generators[1] + + assert C.P == [[identity, None, None, None], + [None, identity, None, None]] + assert C.table == [[1, None, None, None], + [None, 0, None, None]] + + C.modified_define(1, x) + assert C.table == [[1, None, None, None], + [2, 0, None, None], + [None, 1, None, None]] + assert C.P == [[identity, None, None, None], + [identity, identity, None, None], + [None, identity, None, None]] + + C.modified_scan(0, x**3, C._grp.identity, fill=False) + assert C.P == [[identity, identity, None, None], + [identity, identity, None, None], + [identity, identity, None, None]] + assert C.table == [[1, 2, None, None], + [2, 0, None, None], + [0, 1, None, None]] + + C.modified_scan(0, x*y, C._grp.generators[0], fill=False) + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, None]] + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, None]] + + C.modified_define(2, y**-1) + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [None, None, 2, None]] + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [None, None, identity, None]] + + C.modified_scan(0, x**-1*y**-1*x*y*x, C._grp.generators[1]) + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [3, 3, 2, None]] + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [a_1, a_1**-1, identity, None]] + + C.modified_scan(2, (x*y)**2, C._grp.identity) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [3, 3, 2, 0]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [a_1, a_1**-1, identity, a_1]] + + C.modified_define(2, y) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, None], + [0, 1, 4, 3], + [3, 3, 2, 0], + [None, None, None, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [None, None, None, identity]] + + C.modified_scan(0, y**5, C._grp.identity) + assert C.table == [[1, 2, 3, 1], [2, 0, 0, 4], [0, 1, 4, 3], [3, 3, 2, 0], [None, None, 1, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, a_0*a_1**-1], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [None, None, a_1*a_0**-1, identity]] + + C.modified_scan(1, (x*y)**2, C._grp.identity) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, 4], + [0, 1, 4, 3], + [3, 3, 2, 0], + [4, 4, 1, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, a_0*a_1**-1], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [a_0*a_1**-1, a_1*a_0**-1, a_1*a_0**-1, identity]] + + # Modified coset enumeration test + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + C = coset_enumeration_r(f, [x]) + C_m = modified_coset_enumeration_r(f, [x]) + assert C_m.table == C.table diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py new file mode 100644 index 0000000000000000000000000000000000000000..795ef8f08f6ec212879f528c6a0c2f0bd73037f0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py @@ -0,0 +1,105 @@ +from sympy.combinatorics.generators import symmetric, cyclic, alternating, \ + dihedral, rubik +from sympy.combinatorics.permutations import Permutation +from sympy.testing.pytest import raises + +def test_generators(): + + assert list(cyclic(6)) == [ + Permutation([0, 1, 2, 3, 4, 5]), + Permutation([1, 2, 3, 4, 5, 0]), + Permutation([2, 3, 4, 5, 0, 1]), + Permutation([3, 4, 5, 0, 1, 2]), + Permutation([4, 5, 0, 1, 2, 3]), + Permutation([5, 0, 1, 2, 3, 4])] + + assert list(cyclic(10)) == [ + Permutation([0, 1, 2, 3, 4, 5, 6, 7, 8, 9]), + Permutation([1, 2, 3, 4, 5, 6, 7, 8, 9, 0]), + Permutation([2, 3, 4, 5, 6, 7, 8, 9, 0, 1]), + Permutation([3, 4, 5, 6, 7, 8, 9, 0, 1, 2]), + Permutation([4, 5, 6, 7, 8, 9, 0, 1, 2, 3]), + Permutation([5, 6, 7, 8, 9, 0, 1, 2, 3, 4]), + Permutation([6, 7, 8, 9, 0, 1, 2, 3, 4, 5]), + Permutation([7, 8, 9, 0, 1, 2, 3, 4, 5, 6]), + Permutation([8, 9, 0, 1, 2, 3, 4, 5, 6, 7]), + Permutation([9, 0, 1, 2, 3, 4, 5, 6, 7, 8])] + + assert list(alternating(4)) == [ + Permutation([0, 1, 2, 3]), + Permutation([0, 2, 3, 1]), + Permutation([0, 3, 1, 2]), + Permutation([1, 0, 3, 2]), + Permutation([1, 2, 0, 3]), + Permutation([1, 3, 2, 0]), + Permutation([2, 0, 1, 3]), + Permutation([2, 1, 3, 0]), + Permutation([2, 3, 0, 1]), + Permutation([3, 0, 2, 1]), + Permutation([3, 1, 0, 2]), + Permutation([3, 2, 1, 0])] + + assert list(symmetric(3)) == [ + Permutation([0, 1, 2]), + Permutation([0, 2, 1]), + Permutation([1, 0, 2]), + Permutation([1, 2, 0]), + Permutation([2, 0, 1]), + Permutation([2, 1, 0])] + + assert list(symmetric(4)) == [ + Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2]), + Permutation([0, 2, 1, 3]), + Permutation([0, 2, 3, 1]), + Permutation([0, 3, 1, 2]), + Permutation([0, 3, 2, 1]), + Permutation([1, 0, 2, 3]), + Permutation([1, 0, 3, 2]), + Permutation([1, 2, 0, 3]), + Permutation([1, 2, 3, 0]), + Permutation([1, 3, 0, 2]), + Permutation([1, 3, 2, 0]), + Permutation([2, 0, 1, 3]), + Permutation([2, 0, 3, 1]), + Permutation([2, 1, 0, 3]), + Permutation([2, 1, 3, 0]), + Permutation([2, 3, 0, 1]), + Permutation([2, 3, 1, 0]), + Permutation([3, 0, 1, 2]), + Permutation([3, 0, 2, 1]), + Permutation([3, 1, 0, 2]), + Permutation([3, 1, 2, 0]), + Permutation([3, 2, 0, 1]), + Permutation([3, 2, 1, 0])] + + assert list(dihedral(1)) == [ + Permutation([0, 1]), Permutation([1, 0])] + + assert list(dihedral(2)) == [ + Permutation([0, 1, 2, 3]), + Permutation([1, 0, 3, 2]), + Permutation([2, 3, 0, 1]), + Permutation([3, 2, 1, 0])] + + assert list(dihedral(3)) == [ + Permutation([0, 1, 2]), + Permutation([2, 1, 0]), + Permutation([1, 2, 0]), + Permutation([0, 2, 1]), + Permutation([2, 0, 1]), + Permutation([1, 0, 2])] + + assert list(dihedral(5)) == [ + Permutation([0, 1, 2, 3, 4]), + Permutation([4, 3, 2, 1, 0]), + Permutation([1, 2, 3, 4, 0]), + Permutation([0, 4, 3, 2, 1]), + Permutation([2, 3, 4, 0, 1]), + Permutation([1, 0, 4, 3, 2]), + Permutation([3, 4, 0, 1, 2]), + Permutation([2, 1, 0, 4, 3]), + Permutation([4, 0, 1, 2, 3]), + Permutation([3, 2, 1, 0, 4])] + + raises(ValueError, lambda: rubik(1)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..743f1dcc8b642c19706687eeeddf6c9070b59166 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py @@ -0,0 +1,110 @@ +from sympy.combinatorics.group_numbers import (is_nilpotent_number, + is_abelian_number, is_cyclic_number, _holder_formula, groups_count) +from sympy.ntheory.factor_ import factorint +from sympy.ntheory.generate import prime +from sympy.testing.pytest import raises +from sympy import randprime + + +def test_is_nilpotent_number(): + assert is_nilpotent_number(21) == False + assert is_nilpotent_number(randprime(1, 30)**12) == True + raises(ValueError, lambda: is_nilpotent_number(-5)) + + A056867 = [1, 2, 3, 4, 5, 7, 8, 9, 11, 13, 15, 16, 17, 19, + 23, 25, 27, 29, 31, 32, 33, 35, 37, 41, 43, 45, + 47, 49, 51, 53, 59, 61, 64, 65, 67, 69, 71, 73, + 77, 79, 81, 83, 85, 87, 89, 91, 95, 97, 99] + for n in range(1, 100): + assert is_nilpotent_number(n) == (n in A056867) + + +def test_is_abelian_number(): + assert is_abelian_number(4) == True + assert is_abelian_number(randprime(1, 2000)**2) == True + assert is_abelian_number(randprime(1000, 100000)) == True + assert is_abelian_number(60) == False + assert is_abelian_number(24) == False + raises(ValueError, lambda: is_abelian_number(-5)) + + A051532 = [1, 2, 3, 4, 5, 7, 9, 11, 13, 15, 17, 19, 23, 25, + 29, 31, 33, 35, 37, 41, 43, 45, 47, 49, 51, 53, + 59, 61, 65, 67, 69, 71, 73, 77, 79, 83, 85, 87, + 89, 91, 95, 97, 99] + for n in range(1, 100): + assert is_abelian_number(n) == (n in A051532) + + +A003277 = [1, 2, 3, 5, 7, 11, 13, 15, 17, 19, 23, 29, + 31, 33, 35, 37, 41, 43, 47, 51, 53, 59, 61, + 65, 67, 69, 71, 73, 77, 79, 83, 85, 87, 89, + 91, 95, 97] + + +def test_is_cyclic_number(): + assert is_cyclic_number(15) == True + assert is_cyclic_number(randprime(1, 2000)**2) == False + assert is_cyclic_number(randprime(1000, 100000)) == True + assert is_cyclic_number(4) == False + raises(ValueError, lambda: is_cyclic_number(-5)) + + for n in range(1, 100): + assert is_cyclic_number(n) == (n in A003277) + + +def test_holder_formula(): + # semiprime + assert _holder_formula({3, 5}) == 1 + assert _holder_formula({5, 11}) == 2 + # n in A003277 is always 1 + for n in A003277: + assert _holder_formula(set(factorint(n).keys())) == 1 + # otherwise + assert _holder_formula({2, 3, 5, 7}) == 12 + + +def test_groups_count(): + A000001 = [0, 1, 1, 1, 2, 1, 2, 1, 5, 2, 2, 1, 5, 1, + 2, 1, 14, 1, 5, 1, 5, 2, 2, 1, 15, 2, 2, + 5, 4, 1, 4, 1, 51, 1, 2, 1, 14, 1, 2, 2, + 14, 1, 6, 1, 4, 2, 2, 1, 52, 2, 5, 1, 5, + 1, 15, 2, 13, 2, 2, 1, 13, 1, 2, 4, 267, + 1, 4, 1, 5, 1, 4, 1, 50, 1, 2, 3, 4, 1, + 6, 1, 52, 15, 2, 1, 15, 1, 2, 1, 12, 1, + 10, 1, 4, 2] + for n in range(1, len(A000001)): + try: + assert groups_count(n) == A000001[n] + except ValueError: + pass + + A000679 = [1, 1, 2, 5, 14, 51, 267, 2328, 56092, 10494213, 49487367289] + for e in range(1, len(A000679)): + assert groups_count(2**e) == A000679[e] + + A090091 = [1, 1, 2, 5, 15, 67, 504, 9310, 1396077, 5937876645] + for e in range(1, len(A090091)): + assert groups_count(3**e) == A090091[e] + + A090130 = [1, 1, 2, 5, 15, 77, 684, 34297] + for e in range(1, len(A090130)): + assert groups_count(5**e) == A090130[e] + + A090140 = [1, 1, 2, 5, 15, 83, 860, 113147] + for e in range(1, len(A090140)): + assert groups_count(7**e) == A090140[e] + + A232105 = [51, 67, 77, 83, 87, 97, 101, 107, 111, 125, 131, + 145, 149, 155, 159, 173, 183, 193, 203, 207, 217] + for i in range(len(A232105)): + assert groups_count(prime(i+1)**5) == A232105[i] + + A232106 = [267, 504, 684, 860, 1192, 1476, 1944, 2264, 2876, + 4068, 4540, 6012, 7064, 7664, 8852, 10908, 13136] + for i in range(len(A232106)): + assert groups_count(prime(i+1)**6) == A232106[i] + + A232107 = [2328, 9310, 34297, 113147, 750735, 1600573, + 5546909, 9380741, 23316851, 71271069, 98488755] + for i in range(len(A232107)): + assert groups_count(prime(i+1)**7) == A232107[i] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py new file mode 100644 index 0000000000000000000000000000000000000000..0936bbddf46a16dccdfbaebda8d1c675c131f05a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py @@ -0,0 +1,114 @@ +from sympy.combinatorics import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.combinatorics.homomorphisms import homomorphism, group_isomorphism, is_isomorphic +from sympy.combinatorics.free_groups import free_group +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.named_groups import AlternatingGroup, DihedralGroup, CyclicGroup +from sympy.testing.pytest import raises + +def test_homomorphism(): + # FpGroup -> PermutationGroup + F, a, b = free_group("a, b") + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + + c = Permutation(3)(0, 1, 2) + d = Permutation(3)(1, 2, 3) + A = AlternatingGroup(4) + T = homomorphism(G, A, [a, b], [c, d]) + assert T(a*b**2*a**-1) == c*d**2*c**-1 + assert T.is_isomorphism() + assert T(T.invert(Permutation(3)(0, 2, 3))) == Permutation(3)(0, 2, 3) + + T = homomorphism(G, AlternatingGroup(4), G.generators) + assert T.is_trivial() + assert T.kernel().order() == G.order() + + E, e = free_group("e") + G = FpGroup(E, [e**8]) + P = PermutationGroup([Permutation(0, 1, 2, 3), Permutation(0, 2)]) + T = homomorphism(G, P, [e], [Permutation(0, 1, 2, 3)]) + assert T.image().order() == 4 + assert T(T.invert(Permutation(0, 2)(1, 3))) == Permutation(0, 2)(1, 3) + + T = homomorphism(E, AlternatingGroup(4), E.generators, [c]) + assert T.invert(c**2) == e**-1 #order(c) == 3 so c**2 == c**-1 + + # FreeGroup -> FreeGroup + T = homomorphism(F, E, [a], [e]) + assert T(a**-2*b**4*a**2).is_identity + + # FreeGroup -> FpGroup + G = FpGroup(F, [a*b*a**-1*b**-1]) + T = homomorphism(F, G, F.generators, G.generators) + assert T.invert(a**-1*b**-1*a**2) == a*b**-1 + + # PermutationGroup -> PermutationGroup + D = DihedralGroup(8) + p = Permutation(0, 1, 2, 3, 4, 5, 6, 7) + P = PermutationGroup(p) + T = homomorphism(P, D, [p], [p]) + assert T.is_injective() + assert not T.is_isomorphism() + assert T.invert(p**3) == p**3 + + T2 = homomorphism(F, P, [F.generators[0]], P.generators) + T = T.compose(T2) + assert T.domain == F + assert T.codomain == D + assert T(a*b) == p + + D3 = DihedralGroup(3) + T = homomorphism(D3, D3, D3.generators, D3.generators) + assert T.is_isomorphism() + + +def test_isomorphisms(): + + F, a, b = free_group("a, b") + E, c, d = free_group("c, d") + # Infinite groups with differently ordered relators. + G = FpGroup(F, [a**2, b**3]) + H = FpGroup(F, [b**3, a**2]) + assert is_isomorphic(G, H) + + # Trivial Case + # FpGroup -> FpGroup + H = FpGroup(F, [a**3, b**3, (a*b)**2]) + F, c, d = free_group("c, d") + G = FpGroup(F, [c**3, d**3, (c*d)**2]) + check, T = group_isomorphism(G, H) + assert check + assert T(c**3*d**2) == a**3*b**2 + + # FpGroup -> PermutationGroup + # FpGroup is converted to the equivalent isomorphic group. + F, a, b = free_group("a, b") + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + H = AlternatingGroup(4) + check, T = group_isomorphism(G, H) + assert check + assert T(b*a*b**-1*a**-1*b**-1) == Permutation(0, 2, 3) + assert T(b*a*b*a**-1*b**-1) == Permutation(0, 3, 2) + + # PermutationGroup -> PermutationGroup + D = DihedralGroup(8) + p = Permutation(0, 1, 2, 3, 4, 5, 6, 7) + P = PermutationGroup(p) + assert not is_isomorphic(D, P) + + A = CyclicGroup(5) + B = CyclicGroup(7) + assert not is_isomorphic(A, B) + + # Two groups of the same prime order are isomorphic to each other. + G = FpGroup(F, [a, b**5]) + H = CyclicGroup(5) + assert G.order() == H.order() + assert is_isomorphic(G, H) + + +def test_check_homomorphism(): + a = Permutation(1,2,3,4) + b = Permutation(1,3) + G = PermutationGroup([a, b]) + raises(ValueError, lambda: homomorphism(G, G, [a], [a])) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..59bcb6ef3f020335de76d7a72152a0b58cbc6976 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py @@ -0,0 +1,70 @@ +from sympy.combinatorics.named_groups import (SymmetricGroup, CyclicGroup, + DihedralGroup, AlternatingGroup, + AbelianGroup, RubikGroup) +from sympy.testing.pytest import raises + + +def test_SymmetricGroup(): + G = SymmetricGroup(5) + elements = list(G.generate()) + assert (G.generators[0]).size == 5 + assert len(elements) == 120 + assert G.is_solvable is False + assert G.is_abelian is False + assert G.is_nilpotent is False + assert G.is_transitive() is True + H = SymmetricGroup(1) + assert H.order() == 1 + L = SymmetricGroup(2) + assert L.order() == 2 + + +def test_CyclicGroup(): + G = CyclicGroup(10) + elements = list(G.generate()) + assert len(elements) == 10 + assert (G.derived_subgroup()).order() == 1 + assert G.is_abelian is True + assert G.is_solvable is True + assert G.is_nilpotent is True + H = CyclicGroup(1) + assert H.order() == 1 + L = CyclicGroup(2) + assert L.order() == 2 + + +def test_DihedralGroup(): + G = DihedralGroup(6) + elements = list(G.generate()) + assert len(elements) == 12 + assert G.is_transitive() is True + assert G.is_abelian is False + assert G.is_solvable is True + assert G.is_nilpotent is False + H = DihedralGroup(1) + assert H.order() == 2 + L = DihedralGroup(2) + assert L.order() == 4 + assert L.is_abelian is True + assert L.is_nilpotent is True + + +def test_AlternatingGroup(): + G = AlternatingGroup(5) + elements = list(G.generate()) + assert len(elements) == 60 + assert [perm.is_even for perm in elements] == [True]*60 + H = AlternatingGroup(1) + assert H.order() == 1 + L = AlternatingGroup(2) + assert L.order() == 1 + + +def test_AbelianGroup(): + A = AbelianGroup(3, 3, 3) + assert A.order() == 27 + assert A.is_abelian is True + + +def test_RubikGroup(): + raises(ValueError, lambda: RubikGroup(1)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py new file mode 100644 index 0000000000000000000000000000000000000000..32e70e53a53aadbb17c8292bbef8f52d1144d6e0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py @@ -0,0 +1,118 @@ +from sympy.core.sorting import ordered, default_sort_key +from sympy.combinatorics.partitions import (Partition, IntegerPartition, + RGS_enum, RGS_unrank, RGS_rank, + random_integer_partition) +from sympy.testing.pytest import raises +from sympy.utilities.iterables import partitions +from sympy.sets.sets import Set, FiniteSet + + +def test_partition_constructor(): + raises(ValueError, lambda: Partition([1, 1, 2])) + raises(ValueError, lambda: Partition([1, 2, 3], [2, 3, 4])) + raises(ValueError, lambda: Partition(1, 2, 3)) + raises(ValueError, lambda: Partition(*list(range(3)))) + + assert Partition([1, 2, 3], [4, 5]) == Partition([4, 5], [1, 2, 3]) + assert Partition({1, 2, 3}, {4, 5}) == Partition([1, 2, 3], [4, 5]) + + a = FiniteSet(1, 2, 3) + b = FiniteSet(4, 5) + assert Partition(a, b) == Partition([1, 2, 3], [4, 5]) + assert Partition({a, b}) == Partition(FiniteSet(a, b)) + assert Partition({a, b}) != Partition(a, b) + +def test_partition(): + from sympy.abc import x + + a = Partition([1, 2, 3], [4]) + b = Partition([1, 2], [3, 4]) + c = Partition([x]) + l = [a, b, c] + l.sort(key=default_sort_key) + assert l == [c, a, b] + l.sort(key=lambda w: default_sort_key(w, order='rev-lex')) + assert l == [c, a, b] + + assert (a == b) is False + assert a <= b + assert (a > b) is False + assert a != b + assert a < b + + assert (a + 2).partition == [[1, 2], [3, 4]] + assert (b - 1).partition == [[1, 2, 4], [3]] + + assert (a - 1).partition == [[1, 2, 3, 4]] + assert (a + 1).partition == [[1, 2, 4], [3]] + assert (b + 1).partition == [[1, 2], [3], [4]] + + assert a.rank == 1 + assert b.rank == 3 + + assert a.RGS == (0, 0, 0, 1) + assert b.RGS == (0, 0, 1, 1) + + +def test_integer_partition(): + # no zeros in partition + raises(ValueError, lambda: IntegerPartition(list(range(3)))) + # check fails since 1 + 2 != 100 + raises(ValueError, lambda: IntegerPartition(100, list(range(1, 3)))) + a = IntegerPartition(8, [1, 3, 4]) + b = a.next_lex() + c = IntegerPartition([1, 3, 4]) + d = IntegerPartition(8, {1: 3, 3: 1, 2: 1}) + assert a == c + assert a.integer == d.integer + assert a.conjugate == [3, 2, 2, 1] + assert (a == b) is False + assert a <= b + assert (a > b) is False + assert a != b + + for i in range(1, 11): + next = set() + prev = set() + a = IntegerPartition([i]) + ans = {IntegerPartition(p) for p in partitions(i)} + n = len(ans) + for j in range(n): + next.add(a) + a = a.next_lex() + IntegerPartition(i, a.partition) # check it by giving i + for j in range(n): + prev.add(a) + a = a.prev_lex() + IntegerPartition(i, a.partition) # check it by giving i + assert next == ans + assert prev == ans + + assert IntegerPartition([1, 2, 3]).as_ferrers() == '###\n##\n#' + assert IntegerPartition([1, 1, 3]).as_ferrers('o') == 'ooo\no\no' + assert str(IntegerPartition([1, 1, 3])) == '[3, 1, 1]' + assert IntegerPartition([1, 1, 3]).partition == [3, 1, 1] + + raises(ValueError, lambda: random_integer_partition(-1)) + assert random_integer_partition(1) == [1] + assert random_integer_partition(10, seed=[1, 3, 2, 1, 5, 1] + ) == [5, 2, 1, 1, 1] + + +def test_rgs(): + raises(ValueError, lambda: RGS_unrank(-1, 3)) + raises(ValueError, lambda: RGS_unrank(3, 0)) + raises(ValueError, lambda: RGS_unrank(10, 1)) + + raises(ValueError, lambda: Partition.from_rgs(list(range(3)), list(range(2)))) + raises(ValueError, lambda: Partition.from_rgs(list(range(1, 3)), list(range(2)))) + assert RGS_enum(-1) == 0 + assert RGS_enum(1) == 1 + assert RGS_unrank(7, 5) == [0, 0, 1, 0, 2] + assert RGS_unrank(23, 14) == [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 2, 2] + assert RGS_rank(RGS_unrank(40, 100)) == 40 + +def test_ordered_partition_9608(): + a = Partition([1, 2, 3], [4]) + b = Partition([1, 2], [3, 4]) + assert list(ordered([a,b], Set._infimum_key)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..b0c146279921e1e6499534fe9e33b993348d1503 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py @@ -0,0 +1,87 @@ +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.named_groups import SymmetricGroup, AlternatingGroup, DihedralGroup +from sympy.matrices import Matrix + +def test_pc_presentation(): + Groups = [SymmetricGroup(3), SymmetricGroup(4), SymmetricGroup(9).sylow_subgroup(3), + SymmetricGroup(9).sylow_subgroup(2), SymmetricGroup(8).sylow_subgroup(2), DihedralGroup(10)] + + S = SymmetricGroup(125).sylow_subgroup(5) + G = S.derived_series()[2] + Groups.append(G) + + G = SymmetricGroup(25).sylow_subgroup(5) + Groups.append(G) + + S = SymmetricGroup(11**2).sylow_subgroup(11) + G = S.derived_series()[2] + Groups.append(G) + + for G in Groups: + PcGroup = G.polycyclic_group() + collector = PcGroup.collector + pc_presentation = collector.pc_presentation + + pcgs = PcGroup.pcgs + free_group = collector.free_group + free_to_perm = {} + for s, g in zip(free_group.symbols, pcgs): + free_to_perm[s] = g + + for k, v in pc_presentation.items(): + k_array = k.array_form + if v != (): + v_array = v.array_form + + lhs = Permutation() + for gen in k_array: + s = gen[0] + e = gen[1] + lhs = lhs*free_to_perm[s]**e + + if v == (): + assert lhs.is_identity + continue + + rhs = Permutation() + for gen in v_array: + s = gen[0] + e = gen[1] + rhs = rhs*free_to_perm[s]**e + + assert lhs == rhs + + +def test_exponent_vector(): + + Groups = [SymmetricGroup(3), SymmetricGroup(4), SymmetricGroup(9).sylow_subgroup(3), + SymmetricGroup(9).sylow_subgroup(2), SymmetricGroup(8).sylow_subgroup(2)] + + for G in Groups: + PcGroup = G.polycyclic_group() + collector = PcGroup.collector + + pcgs = PcGroup.pcgs + # free_group = collector.free_group + + for gen in G.generators: + exp = collector.exponent_vector(gen) + g = Permutation() + for i in range(len(exp)): + g = g*pcgs[i]**exp[i] if exp[i] else g + assert g == gen + + +def test_induced_pcgs(): + G = [SymmetricGroup(9).sylow_subgroup(3), SymmetricGroup(20).sylow_subgroup(2), AlternatingGroup(4), + DihedralGroup(4), DihedralGroup(10), DihedralGroup(9), SymmetricGroup(3), SymmetricGroup(4)] + + for g in G: + PcGroup = g.polycyclic_group() + collector = PcGroup.collector + gens = list(g.generators) + ipcgs = collector.induced_pcgs(gens) + m = [] + for i in ipcgs: + m.append(collector.exponent_vector(i)) + assert Matrix(m).is_upper diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..763b8fb0ae357500d68c29fe1c9e6b156e224949 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py @@ -0,0 +1,1243 @@ +from sympy.core.containers import Tuple +from sympy.combinatorics.generators import rubik_cube_generators +from sympy.combinatorics.homomorphisms import is_isomorphic +from sympy.combinatorics.named_groups import SymmetricGroup, CyclicGroup,\ + DihedralGroup, AlternatingGroup, AbelianGroup, RubikGroup +from sympy.combinatorics.perm_groups import (PermutationGroup, + _orbit_transversal, Coset, SymmetricPermutationGroup) +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.polyhedron import tetrahedron as Tetra, cube +from sympy.combinatorics.testutil import _verify_bsgs, _verify_centralizer,\ + _verify_normal_closure +from sympy.testing.pytest import skip, XFAIL, slow + +rmul = Permutation.rmul + + +def test_has(): + a = Permutation([1, 0]) + G = PermutationGroup([a]) + assert G.is_abelian + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + assert not G.is_abelian + + G = PermutationGroup([a]) + assert G.has(a) + assert not G.has(b) + + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([0, 2, 1, 3, 4]) + assert PermutationGroup(a, b).degree == \ + PermutationGroup(a, b).degree == 6 + + g = PermutationGroup(Permutation(0, 2, 1)) + assert Tuple(1, g).has(g) + + +def test_generate(): + a = Permutation([1, 0]) + g = list(PermutationGroup([a]).generate()) + assert g == [Permutation([0, 1]), Permutation([1, 0])] + assert len(list(PermutationGroup(Permutation((0, 1))).generate())) == 1 + g = PermutationGroup([a]).generate(method='dimino') + assert list(g) == [Permutation([0, 1]), Permutation([1, 0])] + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + g = G.generate() + v1 = [p.array_form for p in list(g)] + v1.sort() + assert v1 == [[0, 1, 2], [0, 2, 1], [1, 0, 2], [1, 2, 0], [2, 0, + 1], [2, 1, 0]] + v2 = list(G.generate(method='dimino', af=True)) + assert v1 == sorted(v2) + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + g = PermutationGroup([a, b]).generate(af=True) + assert len(list(g)) == 360 + + +def test_order(): + a = Permutation([2, 0, 1, 3, 4, 5, 6, 7, 8, 9]) + b = Permutation([2, 1, 3, 4, 5, 6, 7, 8, 9, 0]) + g = PermutationGroup([a, b]) + assert g.order() == 1814400 + assert PermutationGroup().order() == 1 + + +def test_equality(): + p_1 = Permutation(0, 1, 3) + p_2 = Permutation(0, 2, 3) + p_3 = Permutation(0, 1, 2) + p_4 = Permutation(0, 1, 3) + g_1 = PermutationGroup(p_1, p_2) + g_2 = PermutationGroup(p_3, p_4) + g_3 = PermutationGroup(p_2, p_1) + g_4 = PermutationGroup(p_1, p_2) + + assert g_1 != g_2 + assert g_1.generators != g_2.generators + assert g_1.equals(g_2) + assert g_1 != g_3 + assert g_1.equals(g_3) + assert g_1 == g_4 + + +def test_stabilizer(): + S = SymmetricGroup(2) + H = S.stabilizer(0) + assert H.generators == [Permutation(1)] + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + G = PermutationGroup([a, b]) + G0 = G.stabilizer(0) + assert G0.order() == 60 + + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + G2 = G.stabilizer(2) + assert G2.order() == 6 + G2_1 = G2.stabilizer(1) + v = list(G2_1.generate(af=True)) + assert v == [[0, 1, 2, 3, 4, 5, 6, 7], [3, 1, 2, 0, 7, 5, 6, 4]] + + gens = ( + (1, 2, 0, 4, 5, 3, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19), + (0, 1, 2, 3, 4, 5, 19, 6, 8, 9, 10, 11, 12, 13, 14, + 15, 16, 7, 17, 18), + (0, 1, 2, 3, 4, 5, 6, 7, 9, 18, 16, 11, 12, 13, 14, 15, 8, 17, 10, 19)) + gens = [Permutation(p) for p in gens] + G = PermutationGroup(gens) + G2 = G.stabilizer(2) + assert G2.order() == 181440 + S = SymmetricGroup(3) + assert [G.order() for G in S.basic_stabilizers] == [6, 2] + + +def test_center(): + # the center of the dihedral group D_n is of order 2 for even n + for i in (4, 6, 10): + D = DihedralGroup(i) + assert (D.center()).order() == 2 + # the center of the dihedral group D_n is of order 1 for odd n>2 + for i in (3, 5, 7): + D = DihedralGroup(i) + assert (D.center()).order() == 1 + # the center of an abelian group is the group itself + for i in (2, 3, 5): + for j in (1, 5, 7): + for k in (1, 1, 11): + G = AbelianGroup(i, j, k) + assert G.center().is_subgroup(G) + # the center of a nonabelian simple group is trivial + for i in(1, 5, 9): + A = AlternatingGroup(i) + assert (A.center()).order() == 1 + # brute-force verifications + D = DihedralGroup(5) + A = AlternatingGroup(3) + C = CyclicGroup(4) + G.is_subgroup(D*A*C) + assert _verify_centralizer(G, G) + + +def test_centralizer(): + # the centralizer of the trivial group is the entire group + S = SymmetricGroup(2) + assert S.centralizer(Permutation(list(range(2)))).is_subgroup(S) + A = AlternatingGroup(5) + assert A.centralizer(Permutation(list(range(5)))).is_subgroup(A) + # a centralizer in the trivial group is the trivial group itself + triv = PermutationGroup([Permutation([0, 1, 2, 3])]) + D = DihedralGroup(4) + assert triv.centralizer(D).is_subgroup(triv) + # brute-force verifications for centralizers of groups + for i in (4, 5, 6): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + C = CyclicGroup(i) + D = DihedralGroup(i) + for gp in (S, A, C, D): + for gp2 in (S, A, C, D): + if not gp2.is_subgroup(gp): + assert _verify_centralizer(gp, gp2) + # verify the centralizer for all elements of several groups + S = SymmetricGroup(5) + elements = list(S.generate_dimino()) + for element in elements: + assert _verify_centralizer(S, element) + A = AlternatingGroup(5) + elements = list(A.generate_dimino()) + for element in elements: + assert _verify_centralizer(A, element) + D = DihedralGroup(7) + elements = list(D.generate_dimino()) + for element in elements: + assert _verify_centralizer(D, element) + # verify centralizers of small groups within small groups + small = [] + for i in (1, 2, 3): + small.append(SymmetricGroup(i)) + small.append(AlternatingGroup(i)) + small.append(DihedralGroup(i)) + small.append(CyclicGroup(i)) + for gp in small: + for gp2 in small: + if gp.degree == gp2.degree: + assert _verify_centralizer(gp, gp2) + + +def test_coset_rank(): + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + i = 0 + for h in G.generate(af=True): + rk = G.coset_rank(h) + assert rk == i + h1 = G.coset_unrank(rk, af=True) + assert h == h1 + i += 1 + assert G.coset_unrank(48) is None + assert G.coset_unrank(G.coset_rank(gens[0])) == gens[0] + + +def test_coset_factor(): + a = Permutation([0, 2, 1]) + G = PermutationGroup([a]) + c = Permutation([2, 1, 0]) + assert not G.coset_factor(c) + assert G.coset_rank(c) is None + + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + g = PermutationGroup([a, b]) + assert g.order() == 360 + d = Permutation([1, 0, 2, 3, 4, 5]) + assert not g.coset_factor(d.array_form) + assert not g.contains(d) + assert Permutation(2) in G + c = Permutation([1, 0, 2, 3, 5, 4]) + v = g.coset_factor(c, True) + tr = g.basic_transversals + p = Permutation.rmul(*[tr[i][v[i]] for i in range(len(g.base))]) + assert p == c + v = g.coset_factor(c) + p = Permutation.rmul(*v) + assert p == c + assert g.contains(c) + G = PermutationGroup([Permutation([2, 1, 0])]) + p = Permutation([1, 0, 2]) + assert G.coset_factor(p) == [] + + +def test_orbits(): + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + g = PermutationGroup([a, b]) + assert g.orbit(0) == {0, 1, 2} + assert g.orbits() == [{0, 1, 2}] + assert g.is_transitive() and g.is_transitive(strict=False) + assert g.orbit_transversal(0) == \ + [Permutation( + [0, 1, 2]), Permutation([2, 0, 1]), Permutation([1, 2, 0])] + assert g.orbit_transversal(0, True) == \ + [(0, Permutation([0, 1, 2])), (2, Permutation([2, 0, 1])), + (1, Permutation([1, 2, 0]))] + + G = DihedralGroup(6) + transversal, slps = _orbit_transversal(G.degree, G.generators, 0, True, slp=True) + for i, t in transversal: + slp = slps[i] + w = G.identity + for s in slp: + w = G.generators[s]*w + assert w == t + + a = Permutation(list(range(1, 100)) + [0]) + G = PermutationGroup([a]) + assert [min(o) for o in G.orbits()] == [0] + G = PermutationGroup(rubik_cube_generators()) + assert [min(o) for o in G.orbits()] == [0, 1] + assert not G.is_transitive() and not G.is_transitive(strict=False) + G = PermutationGroup([Permutation(0, 1, 3), Permutation(3)(0, 1)]) + assert not G.is_transitive() and G.is_transitive(strict=False) + assert PermutationGroup( + Permutation(3)).is_transitive(strict=False) is False + + +def test_is_normal(): + gens_s5 = [Permutation(p) for p in [[1, 2, 3, 4, 0], [2, 1, 4, 0, 3]]] + G1 = PermutationGroup(gens_s5) + assert G1.order() == 120 + gens_a5 = [Permutation(p) for p in [[1, 0, 3, 2, 4], [2, 1, 4, 3, 0]]] + G2 = PermutationGroup(gens_a5) + assert G2.order() == 60 + assert G2.is_normal(G1) + gens3 = [Permutation(p) for p in [[2, 1, 3, 0, 4], [1, 2, 0, 3, 4]]] + G3 = PermutationGroup(gens3) + assert not G3.is_normal(G1) + assert G3.order() == 12 + G4 = G1.normal_closure(G3.generators) + assert G4.order() == 60 + gens5 = [Permutation(p) for p in [[1, 2, 3, 0, 4], [1, 2, 0, 3, 4]]] + G5 = PermutationGroup(gens5) + assert G5.order() == 24 + G6 = G1.normal_closure(G5.generators) + assert G6.order() == 120 + assert G1.is_subgroup(G6) + assert not G1.is_subgroup(G4) + assert G2.is_subgroup(G4) + I5 = PermutationGroup(Permutation(4)) + assert I5.is_normal(G5) + assert I5.is_normal(G6, strict=False) + p1 = Permutation([1, 0, 2, 3, 4]) + p2 = Permutation([0, 1, 2, 4, 3]) + p3 = Permutation([3, 4, 2, 1, 0]) + id_ = Permutation([0, 1, 2, 3, 4]) + H = PermutationGroup([p1, p3]) + H_n1 = PermutationGroup([p1, p2]) + H_n2_1 = PermutationGroup(p1) + H_n2_2 = PermutationGroup(p2) + H_id = PermutationGroup(id_) + assert H_n1.is_normal(H) + assert H_n2_1.is_normal(H_n1) + assert H_n2_2.is_normal(H_n1) + assert H_id.is_normal(H_n2_1) + assert H_id.is_normal(H_n1) + assert H_id.is_normal(H) + assert not H_n2_1.is_normal(H) + assert not H_n2_2.is_normal(H) + + +def test_eq(): + a = [[1, 2, 0, 3, 4, 5], [1, 0, 2, 3, 4, 5], [2, 1, 0, 3, 4, 5], [ + 1, 2, 0, 3, 4, 5]] + a = [Permutation(p) for p in a + [[1, 2, 3, 4, 5, 0]]] + g = Permutation([1, 2, 3, 4, 5, 0]) + G1, G2, G3 = [PermutationGroup(x) for x in [a[:2], a[2:4], [g, g**2]]] + assert G1.order() == G2.order() == G3.order() == 6 + assert G1.is_subgroup(G2) + assert not G1.is_subgroup(G3) + G4 = PermutationGroup([Permutation([0, 1])]) + assert not G1.is_subgroup(G4) + assert G4.is_subgroup(G1, 0) + assert PermutationGroup(g, g).is_subgroup(PermutationGroup(g)) + assert SymmetricGroup(3).is_subgroup(SymmetricGroup(4), 0) + assert SymmetricGroup(3).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + assert not CyclicGroup(5).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + assert CyclicGroup(3).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + + +def test_derived_subgroup(): + a = Permutation([1, 0, 2, 4, 3]) + b = Permutation([0, 1, 3, 2, 4]) + G = PermutationGroup([a, b]) + C = G.derived_subgroup() + assert C.order() == 3 + assert C.is_normal(G) + assert C.is_subgroup(G, 0) + assert not G.is_subgroup(C, 0) + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + C = G.derived_subgroup() + assert C.order() == 12 + + +def test_is_solvable(): + a = Permutation([1, 2, 0]) + b = Permutation([1, 0, 2]) + G = PermutationGroup([a, b]) + assert G.is_solvable + G = PermutationGroup([a]) + assert G.is_solvable + a = Permutation([1, 2, 3, 4, 0]) + b = Permutation([1, 0, 2, 3, 4]) + G = PermutationGroup([a, b]) + assert not G.is_solvable + P = SymmetricGroup(10) + S = P.sylow_subgroup(3) + assert S.is_solvable + +def test_rubik1(): + gens = rubik_cube_generators() + gens1 = [gens[-1]] + [p**2 for p in gens[1:]] + G1 = PermutationGroup(gens1) + assert G1.order() == 19508428800 + gens2 = [p**2 for p in gens] + G2 = PermutationGroup(gens2) + assert G2.order() == 663552 + assert G2.is_subgroup(G1, 0) + C1 = G1.derived_subgroup() + assert C1.order() == 4877107200 + assert C1.is_subgroup(G1, 0) + assert not G2.is_subgroup(C1, 0) + + G = RubikGroup(2) + assert G.order() == 3674160 + + +@XFAIL +def test_rubik(): + skip('takes too much time') + G = PermutationGroup(rubik_cube_generators()) + assert G.order() == 43252003274489856000 + G1 = PermutationGroup(G[:3]) + assert G1.order() == 170659735142400 + assert not G1.is_normal(G) + G2 = G.normal_closure(G1.generators) + assert G2.is_subgroup(G) + + +def test_direct_product(): + C = CyclicGroup(4) + D = DihedralGroup(4) + G = C*C*C + assert G.order() == 64 + assert G.degree == 12 + assert len(G.orbits()) == 3 + assert G.is_abelian is True + H = D*C + assert H.order() == 32 + assert H.is_abelian is False + + +def test_orbit_rep(): + G = DihedralGroup(6) + assert G.orbit_rep(1, 3) in [Permutation([2, 3, 4, 5, 0, 1]), + Permutation([4, 3, 2, 1, 0, 5])] + H = CyclicGroup(4)*G + assert H.orbit_rep(1, 5) is False + + +def test_schreier_vector(): + G = CyclicGroup(50) + v = [0]*50 + v[23] = -1 + assert G.schreier_vector(23) == v + H = DihedralGroup(8) + assert H.schreier_vector(2) == [0, 1, -1, 0, 0, 1, 0, 0] + L = SymmetricGroup(4) + assert L.schreier_vector(1) == [1, -1, 0, 0] + + +def test_random_pr(): + D = DihedralGroup(6) + r = 11 + n = 3 + _random_prec_n = {} + _random_prec_n[0] = {'s': 7, 't': 3, 'x': 2, 'e': -1} + _random_prec_n[1] = {'s': 5, 't': 5, 'x': 1, 'e': -1} + _random_prec_n[2] = {'s': 3, 't': 4, 'x': 2, 'e': 1} + D._random_pr_init(r, n, _random_prec_n=_random_prec_n) + assert D._random_gens[11] == [0, 1, 2, 3, 4, 5] + _random_prec = {'s': 2, 't': 9, 'x': 1, 'e': -1} + assert D.random_pr(_random_prec=_random_prec) == \ + Permutation([0, 5, 4, 3, 2, 1]) + + +def test_is_alt_sym(): + G = DihedralGroup(10) + assert G.is_alt_sym() is False + assert G._eval_is_alt_sym_naive() is False + assert G._eval_is_alt_sym_naive(only_alt=True) is False + assert G._eval_is_alt_sym_naive(only_sym=True) is False + + S = SymmetricGroup(10) + assert S._eval_is_alt_sym_naive() is True + assert S._eval_is_alt_sym_naive(only_alt=True) is False + assert S._eval_is_alt_sym_naive(only_sym=True) is True + + N_eps = 10 + _random_prec = {'N_eps': N_eps, + 0: Permutation([[2], [1, 4], [0, 6, 7, 8, 9, 3, 5]]), + 1: Permutation([[1, 8, 7, 6, 3, 5, 2, 9], [0, 4]]), + 2: Permutation([[5, 8], [4, 7], [0, 1, 2, 3, 6, 9]]), + 3: Permutation([[3], [0, 8, 2, 7, 4, 1, 6, 9, 5]]), + 4: Permutation([[8], [4, 7, 9], [3, 6], [0, 5, 1, 2]]), + 5: Permutation([[6], [0, 2, 4, 5, 1, 8, 3, 9, 7]]), + 6: Permutation([[6, 9, 8], [4, 5], [1, 3, 7], [0, 2]]), + 7: Permutation([[4], [0, 2, 9, 1, 3, 8, 6, 5, 7]]), + 8: Permutation([[1, 5, 6, 3], [0, 2, 7, 8, 4, 9]]), + 9: Permutation([[8], [6, 7], [2, 3, 4, 5], [0, 1, 9]])} + assert S.is_alt_sym(_random_prec=_random_prec) is True + + A = AlternatingGroup(10) + assert A._eval_is_alt_sym_naive() is True + assert A._eval_is_alt_sym_naive(only_alt=True) is True + assert A._eval_is_alt_sym_naive(only_sym=True) is False + + _random_prec = {'N_eps': N_eps, + 0: Permutation([[1, 6, 4, 2, 7, 8, 5, 9, 3], [0]]), + 1: Permutation([[1], [0, 5, 8, 4, 9, 2, 3, 6, 7]]), + 2: Permutation([[1, 9, 8, 3, 2, 5], [0, 6, 7, 4]]), + 3: Permutation([[6, 8, 9], [4, 5], [1, 3, 7, 2], [0]]), + 4: Permutation([[8], [5], [4], [2, 6, 9, 3], [1], [0, 7]]), + 5: Permutation([[3, 6], [0, 8, 1, 7, 5, 9, 4, 2]]), + 6: Permutation([[5], [2, 9], [1, 8, 3], [0, 4, 7, 6]]), + 7: Permutation([[1, 8, 4, 7, 2, 3], [0, 6, 9, 5]]), + 8: Permutation([[5, 8, 7], [3], [1, 4, 2, 6], [0, 9]]), + 9: Permutation([[4, 9, 6], [3, 8], [1, 2], [0, 5, 7]])} + assert A.is_alt_sym(_random_prec=_random_prec) is False + + G = PermutationGroup( + Permutation(1, 3, size=8)(0, 2, 4, 6), + Permutation(5, 7, size=8)(0, 2, 4, 6)) + assert G.is_alt_sym() is False + + # Tests for monte-carlo c_n parameter setting, and which guarantees + # to give False. + G = DihedralGroup(10) + assert G._eval_is_alt_sym_monte_carlo() is False + G = DihedralGroup(20) + assert G._eval_is_alt_sym_monte_carlo() is False + + # A dry-running test to check if it looks up for the updated cache. + G = DihedralGroup(6) + G.is_alt_sym() + assert G.is_alt_sym() is False + + +def test_minimal_block(): + D = DihedralGroup(6) + block_system = D.minimal_block([0, 3]) + for i in range(3): + assert block_system[i] == block_system[i + 3] + S = SymmetricGroup(6) + assert S.minimal_block([0, 1]) == [0, 0, 0, 0, 0, 0] + + assert Tetra.pgroup.minimal_block([0, 1]) == [0, 0, 0, 0] + + P1 = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + P2 = PermutationGroup(Permutation(0, 1, 2, 3, 4, 5), Permutation(1, 5)(2, 4)) + assert P1.minimal_block([0, 2]) == [0, 1, 0, 1, 0, 1] + assert P2.minimal_block([0, 2]) == [0, 1, 0, 1, 0, 1] + + +def test_minimal_blocks(): + P = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + assert P.minimal_blocks() == [[0, 1, 0, 1, 0, 1], [0, 1, 2, 0, 1, 2]] + + P = SymmetricGroup(5) + assert P.minimal_blocks() == [[0]*5] + + P = PermutationGroup(Permutation(0, 3)) + assert P.minimal_blocks() is False + + +def test_max_div(): + S = SymmetricGroup(10) + assert S.max_div == 5 + + +def test_is_primitive(): + S = SymmetricGroup(5) + assert S.is_primitive() is True + C = CyclicGroup(7) + assert C.is_primitive() is True + + a = Permutation(0, 1, 2, size=6) + b = Permutation(3, 4, 5, size=6) + G = PermutationGroup(a, b) + assert G.is_primitive() is False + + +def test_random_stab(): + S = SymmetricGroup(5) + _random_el = Permutation([1, 3, 2, 0, 4]) + _random_prec = {'rand': _random_el} + g = S.random_stab(2, _random_prec=_random_prec) + assert g == Permutation([1, 3, 2, 0, 4]) + h = S.random_stab(1) + assert h(1) == 1 + + +def test_transitivity_degree(): + perm = Permutation([1, 2, 0]) + C = PermutationGroup([perm]) + assert C.transitivity_degree == 1 + gen1 = Permutation([1, 2, 0, 3, 4]) + gen2 = Permutation([1, 2, 3, 4, 0]) + # alternating group of degree 5 + Alt = PermutationGroup([gen1, gen2]) + assert Alt.transitivity_degree == 3 + + +def test_schreier_sims_random(): + assert sorted(Tetra.pgroup.base) == [0, 1] + + S = SymmetricGroup(3) + base = [0, 1] + strong_gens = [Permutation([1, 2, 0]), Permutation([1, 0, 2]), + Permutation([0, 2, 1])] + assert S.schreier_sims_random(base, strong_gens, 5) == (base, strong_gens) + D = DihedralGroup(3) + _random_prec = {'g': [Permutation([2, 0, 1]), Permutation([1, 2, 0]), + Permutation([1, 0, 2])]} + base = [0, 1] + strong_gens = [Permutation([1, 2, 0]), Permutation([2, 1, 0]), + Permutation([0, 2, 1])] + assert D.schreier_sims_random([], D.generators, 2, + _random_prec=_random_prec) == (base, strong_gens) + + +def test_baseswap(): + S = SymmetricGroup(4) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + assert base == [0, 1, 2] + deterministic = S.baseswap(base, strong_gens, 1, randomized=False) + randomized = S.baseswap(base, strong_gens, 1) + assert deterministic[0] == [0, 2, 1] + assert _verify_bsgs(S, deterministic[0], deterministic[1]) is True + assert randomized[0] == [0, 2, 1] + assert _verify_bsgs(S, randomized[0], randomized[1]) is True + + +def test_schreier_sims_incremental(): + identity = Permutation([0, 1, 2, 3, 4]) + TrivialGroup = PermutationGroup([identity]) + base, strong_gens = TrivialGroup.schreier_sims_incremental(base=[0, 1, 2]) + assert _verify_bsgs(TrivialGroup, base, strong_gens) is True + S = SymmetricGroup(5) + base, strong_gens = S.schreier_sims_incremental(base=[0, 1, 2]) + assert _verify_bsgs(S, base, strong_gens) is True + D = DihedralGroup(2) + base, strong_gens = D.schreier_sims_incremental(base=[1]) + assert _verify_bsgs(D, base, strong_gens) is True + A = AlternatingGroup(7) + gens = A.generators[:] + gen0 = gens[0] + gen1 = gens[1] + gen1 = rmul(gen1, ~gen0) + gen0 = rmul(gen0, gen1) + gen1 = rmul(gen0, gen1) + base, strong_gens = A.schreier_sims_incremental(base=[0, 1], gens=gens) + assert _verify_bsgs(A, base, strong_gens) is True + C = CyclicGroup(11) + gen = C.generators[0] + base, strong_gens = C.schreier_sims_incremental(gens=[gen**3]) + assert _verify_bsgs(C, base, strong_gens) is True + + +def _subgroup_search(i, j, k): + prop_true = lambda x: True + prop_fix_points = lambda x: [x(point) for point in points] == points + prop_comm_g = lambda x: rmul(x, g) == rmul(g, x) + prop_even = lambda x: x.is_even + for i in range(i, j, k): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + C = CyclicGroup(i) + Sym = S.subgroup_search(prop_true) + assert Sym.is_subgroup(S) + Alt = S.subgroup_search(prop_even) + assert Alt.is_subgroup(A) + Sym = S.subgroup_search(prop_true, init_subgroup=C) + assert Sym.is_subgroup(S) + points = [7] + assert S.stabilizer(7).is_subgroup(S.subgroup_search(prop_fix_points)) + points = [3, 4] + assert S.stabilizer(3).stabilizer(4).is_subgroup( + S.subgroup_search(prop_fix_points)) + points = [3, 5] + fix35 = A.subgroup_search(prop_fix_points) + points = [5] + fix5 = A.subgroup_search(prop_fix_points) + assert A.subgroup_search(prop_fix_points, init_subgroup=fix35 + ).is_subgroup(fix5) + base, strong_gens = A.schreier_sims_incremental() + g = A.generators[0] + comm_g = \ + A.subgroup_search(prop_comm_g, base=base, strong_gens=strong_gens) + assert _verify_bsgs(comm_g, base, comm_g.generators) is True + assert [prop_comm_g(gen) is True for gen in comm_g.generators] + + +def test_subgroup_search(): + _subgroup_search(10, 15, 2) + + +@XFAIL +def test_subgroup_search2(): + skip('takes too much time') + _subgroup_search(16, 17, 1) + + +def test_normal_closure(): + # the normal closure of the trivial group is trivial + S = SymmetricGroup(3) + identity = Permutation([0, 1, 2]) + closure = S.normal_closure(identity) + assert closure.is_trivial + # the normal closure of the entire group is the entire group + A = AlternatingGroup(4) + assert A.normal_closure(A).is_subgroup(A) + # brute-force verifications for subgroups + for i in (3, 4, 5): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + D = DihedralGroup(i) + C = CyclicGroup(i) + for gp in (A, D, C): + assert _verify_normal_closure(S, gp) + # brute-force verifications for all elements of a group + S = SymmetricGroup(5) + elements = list(S.generate_dimino()) + for element in elements: + assert _verify_normal_closure(S, element) + # small groups + small = [] + for i in (1, 2, 3): + small.append(SymmetricGroup(i)) + small.append(AlternatingGroup(i)) + small.append(DihedralGroup(i)) + small.append(CyclicGroup(i)) + for gp in small: + for gp2 in small: + if gp2.is_subgroup(gp, 0) and gp2.degree == gp.degree: + assert _verify_normal_closure(gp, gp2) + + +def test_derived_series(): + # the derived series of the trivial group consists only of the trivial group + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert triv.derived_series()[0].is_subgroup(triv) + # the derived series for a simple group consists only of the group itself + for i in (5, 6, 7): + A = AlternatingGroup(i) + assert A.derived_series()[0].is_subgroup(A) + # the derived series for S_4 is S_4 > A_4 > K_4 > triv + S = SymmetricGroup(4) + series = S.derived_series() + assert series[1].is_subgroup(AlternatingGroup(4)) + assert series[2].is_subgroup(DihedralGroup(2)) + assert series[3].is_trivial + + +def test_lower_central_series(): + # the lower central series of the trivial group consists of the trivial + # group + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert triv.lower_central_series()[0].is_subgroup(triv) + # the lower central series of a simple group consists of the group itself + for i in (5, 6, 7): + A = AlternatingGroup(i) + assert A.lower_central_series()[0].is_subgroup(A) + # GAP-verified example + S = SymmetricGroup(6) + series = S.lower_central_series() + assert len(series) == 2 + assert series[1].is_subgroup(AlternatingGroup(6)) + + +def test_commutator(): + # the commutator of the trivial group and the trivial group is trivial + S = SymmetricGroup(3) + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert S.commutator(triv, triv).is_subgroup(triv) + # the commutator of the trivial group and any other group is again trivial + A = AlternatingGroup(3) + assert S.commutator(triv, A).is_subgroup(triv) + # the commutator is commutative + for i in (3, 4, 5): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + D = DihedralGroup(i) + assert S.commutator(A, D).is_subgroup(S.commutator(D, A)) + # the commutator of an abelian group is trivial + S = SymmetricGroup(7) + A1 = AbelianGroup(2, 5) + A2 = AbelianGroup(3, 4) + triv = PermutationGroup([Permutation([0, 1, 2, 3, 4, 5, 6])]) + assert S.commutator(A1, A1).is_subgroup(triv) + assert S.commutator(A2, A2).is_subgroup(triv) + # examples calculated by hand + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert S.commutator(A, S).is_subgroup(A) + + +def test_is_nilpotent(): + # every abelian group is nilpotent + for i in (1, 2, 3): + C = CyclicGroup(i) + Ab = AbelianGroup(i, i + 2) + assert C.is_nilpotent + assert Ab.is_nilpotent + Ab = AbelianGroup(5, 7, 10) + assert Ab.is_nilpotent + # A_5 is not solvable and thus not nilpotent + assert AlternatingGroup(5).is_nilpotent is False + + +def test_is_trivial(): + for i in range(5): + triv = PermutationGroup([Permutation(list(range(i)))]) + assert triv.is_trivial + + +def test_pointwise_stabilizer(): + S = SymmetricGroup(2) + stab = S.pointwise_stabilizer([0]) + assert stab.generators == [Permutation(1)] + S = SymmetricGroup(5) + points = [] + stab = S + for point in (2, 0, 3, 4, 1): + stab = stab.stabilizer(point) + points.append(point) + assert S.pointwise_stabilizer(points).is_subgroup(stab) + + +def test_make_perm(): + assert cube.pgroup.make_perm(5, seed=list(range(5))) == \ + Permutation([4, 7, 6, 5, 0, 3, 2, 1]) + assert cube.pgroup.make_perm(7, seed=list(range(7))) == \ + Permutation([6, 7, 3, 2, 5, 4, 0, 1]) + + +def test_elements(): + from sympy.sets.sets import FiniteSet + + p = Permutation(2, 3) + assert set(PermutationGroup(p).elements) == {Permutation(3), Permutation(2, 3)} + assert FiniteSet(*PermutationGroup(p).elements) \ + == FiniteSet(Permutation(2, 3), Permutation(3)) + + +def test_is_group(): + assert PermutationGroup(Permutation(1,2), Permutation(2,4)).is_group is True + assert SymmetricGroup(4).is_group is True + + +def test_PermutationGroup(): + assert PermutationGroup() == PermutationGroup(Permutation()) + assert (PermutationGroup() == 0) is False + + +def test_coset_transvesal(): + G = AlternatingGroup(5) + H = PermutationGroup(Permutation(0,1,2),Permutation(1,2)(3,4)) + assert G.coset_transversal(H) == \ + [Permutation(4), Permutation(2, 3, 4), Permutation(2, 4, 3), + Permutation(1, 2, 4), Permutation(4)(1, 2, 3), Permutation(1, 3)(2, 4), + Permutation(0, 1, 2, 3, 4), Permutation(0, 1, 2, 4, 3), + Permutation(0, 1, 3, 2, 4), Permutation(0, 2, 4, 1, 3)] + + +def test_coset_table(): + G = PermutationGroup(Permutation(0,1,2,3), Permutation(0,1,2), + Permutation(0,4,2,7), Permutation(5,6), Permutation(0,7)) + H = PermutationGroup(Permutation(0,1,2,3), Permutation(0,7)) + assert G.coset_table(H) == \ + [[0, 0, 0, 0, 1, 2, 3, 3, 0, 0], [4, 5, 2, 5, 6, 0, 7, 7, 1, 1], + [5, 4, 5, 1, 0, 6, 8, 8, 6, 6], [3, 3, 3, 3, 7, 8, 0, 0, 3, 3], + [2, 1, 4, 4, 4, 4, 9, 9, 4, 4], [1, 2, 1, 2, 5, 5, 10, 10, 5, 5], + [6, 6, 6, 6, 2, 1, 11, 11, 2, 2], [9, 10, 8, 10, 11, 3, 1, 1, 7, 7], + [10, 9, 10, 7, 3, 11, 2, 2, 11, 11], [8, 7, 9, 9, 9, 9, 4, 4, 9, 9], + [7, 8, 7, 8, 10, 10, 5, 5, 10, 10], [11, 11, 11, 11, 8, 7, 6, 6, 8, 8]] + + +def test_subgroup(): + G = PermutationGroup(Permutation(0,1,2), Permutation(0,2,3)) + H = G.subgroup([Permutation(0,1,3)]) + assert H.is_subgroup(G) + + +def test_generator_product(): + G = SymmetricGroup(5) + p = Permutation(0, 2, 3)(1, 4) + gens = G.generator_product(p) + assert all(g in G.strong_gens for g in gens) + w = G.identity + for g in gens: + w = g*w + assert w == p + + +def test_sylow_subgroup(): + P = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + S = P.sylow_subgroup(2) + assert S.order() == 4 + + P = DihedralGroup(12) + S = P.sylow_subgroup(3) + assert S.order() == 3 + + P = PermutationGroup( + Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5), Permutation(0, 2)) + S = P.sylow_subgroup(3) + assert S.order() == 9 + S = P.sylow_subgroup(2) + assert S.order() == 8 + + P = SymmetricGroup(10) + S = P.sylow_subgroup(2) + assert S.order() == 256 + S = P.sylow_subgroup(3) + assert S.order() == 81 + S = P.sylow_subgroup(5) + assert S.order() == 25 + + # the length of the lower central series + # of a p-Sylow subgroup of Sym(n) grows with + # the highest exponent exp of p such + # that n >= p**exp + exp = 1 + length = 0 + for i in range(2, 9): + P = SymmetricGroup(i) + S = P.sylow_subgroup(2) + ls = S.lower_central_series() + if i // 2**exp > 0: + # length increases with exponent + assert len(ls) > length + length = len(ls) + exp += 1 + else: + assert len(ls) == length + + G = SymmetricGroup(100) + S = G.sylow_subgroup(3) + assert G.order() % S.order() == 0 + assert G.order()/S.order() % 3 > 0 + + G = AlternatingGroup(100) + S = G.sylow_subgroup(2) + assert G.order() % S.order() == 0 + assert G.order()/S.order() % 2 > 0 + + G = DihedralGroup(18) + S = G.sylow_subgroup(p=2) + assert S.order() == 4 + + G = DihedralGroup(50) + S = G.sylow_subgroup(p=2) + assert S.order() == 4 + + +@slow +def test_presentation(): + def _test(P): + G = P.presentation() + return G.order() == P.order() + + def _strong_test(P): + G = P.strong_presentation() + chk = len(G.generators) == len(P.strong_gens) + return chk and G.order() == P.order() + + P = PermutationGroup(Permutation(0,1,5,2)(3,7,4,6), Permutation(0,3,5,4)(1,6,2,7)) + assert _test(P) + + P = AlternatingGroup(5) + assert _test(P) + + P = SymmetricGroup(5) + assert _test(P) + + P = PermutationGroup( + [Permutation(0,3,1,2), Permutation(3)(0,1), Permutation(0,1)(2,3)]) + assert _strong_test(P) + + P = DihedralGroup(6) + assert _strong_test(P) + + a = Permutation(0,1)(2,3) + b = Permutation(0,2)(3,1) + c = Permutation(4,5) + P = PermutationGroup(c, a, b) + assert _strong_test(P) + + +def test_polycyclic(): + a = Permutation([0, 1, 2]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + assert G.is_polycyclic is True + + a = Permutation([1, 2, 3, 4, 0]) + b = Permutation([1, 0, 2, 3, 4]) + G = PermutationGroup([a, b]) + assert G.is_polycyclic is False + + +def test_elementary(): + a = Permutation([1, 5, 2, 0, 3, 6, 4]) + G = PermutationGroup([a]) + assert G.is_elementary(7) is False + + a = Permutation(0, 1)(2, 3) + b = Permutation(0, 2)(3, 1) + G = PermutationGroup([a, b]) + assert G.is_elementary(2) is True + c = Permutation(4, 5, 6) + G = PermutationGroup([a, b, c]) + assert G.is_elementary(2) is False + + G = SymmetricGroup(4).sylow_subgroup(2) + assert G.is_elementary(2) is False + H = AlternatingGroup(4).sylow_subgroup(2) + assert H.is_elementary(2) is True + + +def test_perfect(): + G = AlternatingGroup(3) + assert G.is_perfect is False + G = AlternatingGroup(5) + assert G.is_perfect is True + + +def test_index(): + G = PermutationGroup(Permutation(0,1,2), Permutation(0,2,3)) + H = G.subgroup([Permutation(0,1,3)]) + assert G.index(H) == 4 + + +def test_cyclic(): + G = SymmetricGroup(2) + assert G.is_cyclic + G = AbelianGroup(3, 7) + assert G.is_cyclic + G = AbelianGroup(7, 7) + assert not G.is_cyclic + G = AlternatingGroup(3) + assert G.is_cyclic + G = AlternatingGroup(4) + assert not G.is_cyclic + + # Order less than 6 + G = PermutationGroup(Permutation(0, 1, 2), Permutation(0, 2, 1)) + assert G.is_cyclic + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(0, 2)(1, 3) + ) + assert G.is_cyclic + G = PermutationGroup( + Permutation(3), + Permutation(0, 1)(2, 3), + Permutation(0, 2)(1, 3), + Permutation(0, 3)(1, 2) + ) + assert G.is_cyclic is False + + # Order 15 + G = PermutationGroup( + Permutation(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14), + Permutation(0, 2, 4, 6, 8, 10, 12, 14, 1, 3, 5, 7, 9, 11, 13) + ) + assert G.is_cyclic + + # Distinct prime orders + assert PermutationGroup._distinct_primes_lemma([3, 5]) is True + assert PermutationGroup._distinct_primes_lemma([5, 7]) is True + assert PermutationGroup._distinct_primes_lemma([2, 3]) is None + assert PermutationGroup._distinct_primes_lemma([3, 5, 7]) is None + assert PermutationGroup._distinct_primes_lemma([5, 7, 13]) is True + + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(0, 2)(1, 3)) + assert G.is_cyclic + assert G._is_abelian + + # Non-abelian and therefore not cyclic + G = PermutationGroup(*SymmetricGroup(3).generators) + assert G.is_cyclic is False + + # Abelian and cyclic + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(4, 5, 6) + ) + assert G.is_cyclic + + # Abelian but not cyclic + G = PermutationGroup( + Permutation(0, 1), + Permutation(2, 3), + Permutation(4, 5, 6) + ) + assert G.is_cyclic is False + + +def test_dihedral(): + G = SymmetricGroup(2) + assert G.is_dihedral + G = SymmetricGroup(3) + assert G.is_dihedral + + G = AbelianGroup(2, 2) + assert G.is_dihedral + G = CyclicGroup(4) + assert not G.is_dihedral + + G = AbelianGroup(3, 5) + assert not G.is_dihedral + G = AbelianGroup(2) + assert G.is_dihedral + G = AbelianGroup(6) + assert not G.is_dihedral + + # D6, generated by two adjacent flips + G = PermutationGroup( + Permutation(1, 5)(2, 4), + Permutation(0, 1)(3, 4)(2, 5)) + assert G.is_dihedral + + # D7, generated by a flip and a rotation + G = PermutationGroup( + Permutation(1, 6)(2, 5)(3, 4), + Permutation(0, 1, 2, 3, 4, 5, 6)) + assert G.is_dihedral + + # S4, presented by three generators, fails due to having exactly 9 + # elements of order 2: + G = PermutationGroup( + Permutation(0, 1), Permutation(0, 2), + Permutation(0, 3)) + assert not G.is_dihedral + + # D7, given by three generators + G = PermutationGroup( + Permutation(1, 6)(2, 5)(3, 4), + Permutation(2, 0)(3, 6)(4, 5), + Permutation(0, 1, 2, 3, 4, 5, 6)) + assert G.is_dihedral + + +def test_abelian_invariants(): + G = AbelianGroup(2, 3, 4) + assert G.abelian_invariants() == [2, 3, 4] + G=PermutationGroup([Permutation(1, 2, 3, 4), Permutation(1, 2), Permutation(5, 6)]) + assert G.abelian_invariants() == [2, 2] + G = AlternatingGroup(7) + assert G.abelian_invariants() == [] + G = AlternatingGroup(4) + assert G.abelian_invariants() == [3] + G = DihedralGroup(4) + assert G.abelian_invariants() == [2, 2] + + G = PermutationGroup([Permutation(1, 2, 3, 4, 5, 6, 7)]) + assert G.abelian_invariants() == [7] + G = DihedralGroup(12) + S = G.sylow_subgroup(3) + assert S.abelian_invariants() == [3] + G = PermutationGroup(Permutation(0, 1, 2), Permutation(0, 2, 3)) + assert G.abelian_invariants() == [3] + G = PermutationGroup([Permutation(0, 1), Permutation(0, 2, 4, 6)(1, 3, 5, 7)]) + assert G.abelian_invariants() == [2, 4] + G = SymmetricGroup(30) + S = G.sylow_subgroup(2) + assert S.abelian_invariants() == [2, 2, 2, 2, 2, 2, 2, 2, 2, 2] + S = G.sylow_subgroup(3) + assert S.abelian_invariants() == [3, 3, 3, 3] + S = G.sylow_subgroup(5) + assert S.abelian_invariants() == [5, 5, 5] + + +def test_composition_series(): + a = Permutation(1, 2, 3) + b = Permutation(1, 2) + G = PermutationGroup([a, b]) + comp_series = G.composition_series() + assert comp_series == G.derived_series() + # The first group in the composition series is always the group itself and + # the last group in the series is the trivial group. + S = SymmetricGroup(4) + assert S.composition_series()[0] == S + assert len(S.composition_series()) == 5 + A = AlternatingGroup(4) + assert A.composition_series()[0] == A + assert len(A.composition_series()) == 4 + + # the composition series for C_8 is C_8 > C_4 > C_2 > triv + G = CyclicGroup(8) + series = G.composition_series() + assert is_isomorphic(series[1], CyclicGroup(4)) + assert is_isomorphic(series[2], CyclicGroup(2)) + assert series[3].is_trivial + + +def test_is_symmetric(): + a = Permutation(0, 1, 2) + b = Permutation(0, 1, size=3) + assert PermutationGroup(a, b).is_symmetric is True + + a = Permutation(0, 2, 1) + b = Permutation(1, 2, size=3) + assert PermutationGroup(a, b).is_symmetric is True + + a = Permutation(0, 1, 2, 3) + b = Permutation(0, 3)(1, 2) + assert PermutationGroup(a, b).is_symmetric is False + +def test_conjugacy_class(): + S = SymmetricGroup(4) + x = Permutation(1, 2, 3) + C = {Permutation(0, 1, 2, size = 4), Permutation(0, 1, 3), + Permutation(0, 2, 1, size = 4), Permutation(0, 2, 3), + Permutation(0, 3, 1), Permutation(0, 3, 2), + Permutation(1, 2, 3), Permutation(1, 3, 2)} + assert S.conjugacy_class(x) == C + +def test_conjugacy_classes(): + S = SymmetricGroup(3) + expected = [{Permutation(size = 3)}, + {Permutation(0, 1, size = 3), Permutation(0, 2), Permutation(1, 2)}, + {Permutation(0, 1, 2), Permutation(0, 2, 1)}] + computed = S.conjugacy_classes() + + assert len(expected) == len(computed) + assert all(e in computed for e in expected) + +def test_coset_class(): + a = Permutation(1, 2) + b = Permutation(0, 1) + G = PermutationGroup([a, b]) + #Creating right coset + rht_coset = G*a + #Checking whether it is left coset or right coset + assert rht_coset.is_right_coset + assert not rht_coset.is_left_coset + #Creating list representation of coset + list_repr = rht_coset.as_list() + expected = [Permutation(0, 2), Permutation(0, 2, 1), Permutation(1, 2), + Permutation(2), Permutation(2)(0, 1), Permutation(0, 1, 2)] + for ele in list_repr: + assert ele in expected + #Creating left coset + left_coset = a*G + #Checking whether it is left coset or right coset + assert not left_coset.is_right_coset + assert left_coset.is_left_coset + #Creating list representation of Coset + list_repr = left_coset.as_list() + expected = [Permutation(2)(0, 1), Permutation(0, 1, 2), Permutation(1, 2), + Permutation(2), Permutation(0, 2), Permutation(0, 2, 1)] + for ele in list_repr: + assert ele in expected + + G = PermutationGroup(Permutation(1, 2, 3, 4), Permutation(2, 3, 4)) + H = PermutationGroup(Permutation(1, 2, 3, 4)) + g = Permutation(1, 3)(2, 4) + rht_coset = Coset(g, H, G, dir='+') + assert rht_coset.is_right_coset + list_repr = rht_coset.as_list() + expected = [Permutation(1, 2, 3, 4), Permutation(4), Permutation(1, 3)(2, 4), + Permutation(1, 4, 3, 2)] + for ele in list_repr: + assert ele in expected + +def test_symmetricpermutationgroup(): + a = SymmetricPermutationGroup(5) + assert a.degree == 5 + assert a.order() == 120 + assert a.identity() == Permutation(4) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py new file mode 100644 index 0000000000000000000000000000000000000000..b52fcfec0e2fb3be872efaa814077760e121c748 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py @@ -0,0 +1,564 @@ +from itertools import permutations +from copy import copy + +from sympy.core.expr import unchanged +from sympy.core.numbers import Integer +from sympy.core.relational import Eq +from sympy.core.symbol import Symbol +from sympy.core.singleton import S +from sympy.combinatorics.permutations import \ + Permutation, _af_parity, _af_rmul, _af_rmuln, AppliedPermutation, Cycle +from sympy.printing import sstr, srepr, pretty, latex +from sympy.testing.pytest import raises, warns_deprecated_sympy + + +rmul = Permutation.rmul +a = Symbol('a', integer=True) + + +def test_Permutation(): + # don't auto fill 0 + raises(ValueError, lambda: Permutation([1])) + p = Permutation([0, 1, 2, 3]) + # call as bijective + assert [p(i) for i in range(p.size)] == list(p) + # call as operator + assert p(list(range(p.size))) == list(p) + # call as function + assert list(p(1, 2)) == [0, 2, 1, 3] + raises(TypeError, lambda: p(-1)) + raises(TypeError, lambda: p(5)) + # conversion to list + assert list(p) == list(range(4)) + assert p.copy() == p + assert copy(p) == p + assert Permutation(size=4) == Permutation(3) + assert Permutation(Permutation(3), size=5) == Permutation(4) + # cycle form with size + assert Permutation([[1, 2]], size=4) == Permutation([[1, 2], [0], [3]]) + # random generation + assert Permutation.random(2) in (Permutation([1, 0]), Permutation([0, 1])) + + p = Permutation([2, 5, 1, 6, 3, 0, 4]) + q = Permutation([[1], [0, 3, 5, 6, 2, 4]]) + assert len({p, p}) == 1 + r = Permutation([1, 3, 2, 0, 4, 6, 5]) + ans = Permutation(_af_rmuln(*[w.array_form for w in (p, q, r)])).array_form + assert rmul(p, q, r).array_form == ans + # make sure no other permutation of p, q, r could have given + # that answer + for a, b, c in permutations((p, q, r)): + if (a, b, c) == (p, q, r): + continue + assert rmul(a, b, c).array_form != ans + + assert p.support() == list(range(7)) + assert q.support() == [0, 2, 3, 4, 5, 6] + assert Permutation(p.cyclic_form).array_form == p.array_form + assert p.cardinality == 5040 + assert q.cardinality == 5040 + assert q.cycles == 2 + assert rmul(q, p) == Permutation([4, 6, 1, 2, 5, 3, 0]) + assert rmul(p, q) == Permutation([6, 5, 3, 0, 2, 4, 1]) + assert _af_rmul(p.array_form, q.array_form) == \ + [6, 5, 3, 0, 2, 4, 1] + + assert rmul(Permutation([[1, 2, 3], [0, 4]]), + Permutation([[1, 2, 4], [0], [3]])).cyclic_form == \ + [[0, 4, 2], [1, 3]] + assert q.array_form == [3, 1, 4, 5, 0, 6, 2] + assert q.cyclic_form == [[0, 3, 5, 6, 2, 4]] + assert q.full_cyclic_form == [[0, 3, 5, 6, 2, 4], [1]] + assert p.cyclic_form == [[0, 2, 1, 5], [3, 6, 4]] + t = p.transpositions() + assert t == [(0, 5), (0, 1), (0, 2), (3, 4), (3, 6)] + assert Permutation.rmul(*[Permutation(Cycle(*ti)) for ti in (t)]) + assert Permutation([1, 0]).transpositions() == [(0, 1)] + + assert p**13 == p + assert q**0 == Permutation(list(range(q.size))) + assert q**-2 == ~q**2 + assert q**2 == Permutation([5, 1, 0, 6, 3, 2, 4]) + assert q**3 == q**2*q + assert q**4 == q**2*q**2 + + a = Permutation(1, 3) + b = Permutation(2, 0, 3) + I = Permutation(3) + assert ~a == a**-1 + assert a*~a == I + assert a*b**-1 == a*~b + + ans = Permutation(0, 5, 3, 1, 6)(2, 4) + assert (p + q.rank()).rank() == ans.rank() + assert (p + q.rank())._rank == ans.rank() + assert (q + p.rank()).rank() == ans.rank() + raises(TypeError, lambda: p + Permutation(list(range(10)))) + + assert (p - q.rank()).rank() == Permutation(0, 6, 3, 1, 2, 5, 4).rank() + assert p.rank() - q.rank() < 0 # for coverage: make sure mod is used + assert (q - p.rank()).rank() == Permutation(1, 4, 6, 2)(3, 5).rank() + + assert p*q == Permutation(_af_rmuln(*[list(w) for w in (q, p)])) + assert p*Permutation([]) == p + assert Permutation([])*p == p + assert p*Permutation([[0, 1]]) == Permutation([2, 5, 0, 6, 3, 1, 4]) + assert Permutation([[0, 1]])*p == Permutation([5, 2, 1, 6, 3, 0, 4]) + + pq = p ^ q + assert pq == Permutation([5, 6, 0, 4, 1, 2, 3]) + assert pq == rmul(q, p, ~q) + qp = q ^ p + assert qp == Permutation([4, 3, 6, 2, 1, 5, 0]) + assert qp == rmul(p, q, ~p) + raises(ValueError, lambda: p ^ Permutation([])) + + assert p.commutator(q) == Permutation(0, 1, 3, 4, 6, 5, 2) + assert q.commutator(p) == Permutation(0, 2, 5, 6, 4, 3, 1) + assert p.commutator(q) == ~q.commutator(p) + raises(ValueError, lambda: p.commutator(Permutation([]))) + + assert len(p.atoms()) == 7 + assert q.atoms() == {0, 1, 2, 3, 4, 5, 6} + + assert p.inversion_vector() == [2, 4, 1, 3, 1, 0] + assert q.inversion_vector() == [3, 1, 2, 2, 0, 1] + + assert Permutation.from_inversion_vector(p.inversion_vector()) == p + assert Permutation.from_inversion_vector(q.inversion_vector()).array_form\ + == q.array_form + raises(ValueError, lambda: Permutation.from_inversion_vector([0, 2])) + assert Permutation(list(range(500, -1, -1))).inversions() == 125250 + + s = Permutation([0, 4, 1, 3, 2]) + assert s.parity() == 0 + _ = s.cyclic_form # needed to create a value for _cyclic_form + assert len(s._cyclic_form) != s.size and s.parity() == 0 + assert not s.is_odd + assert s.is_even + assert Permutation([0, 1, 4, 3, 2]).parity() == 1 + assert _af_parity([0, 4, 1, 3, 2]) == 0 + assert _af_parity([0, 1, 4, 3, 2]) == 1 + + s = Permutation([0]) + + assert s.is_Singleton + assert Permutation([]).is_Empty + + r = Permutation([3, 2, 1, 0]) + assert (r**2).is_Identity + + assert rmul(~p, p).is_Identity + assert (~p)**13 == Permutation([5, 2, 0, 4, 6, 1, 3]) + assert p.max() == 6 + assert p.min() == 0 + + q = Permutation([[6], [5], [0, 1, 2, 3, 4]]) + + assert q.max() == 4 + assert q.min() == 0 + + p = Permutation([1, 5, 2, 0, 3, 6, 4]) + q = Permutation([[1, 2, 3, 5, 6], [0, 4]]) + + assert p.ascents() == [0, 3, 4] + assert q.ascents() == [1, 2, 4] + assert r.ascents() == [] + + assert p.descents() == [1, 2, 5] + assert q.descents() == [0, 3, 5] + assert Permutation(r.descents()).is_Identity + + assert p.inversions() == 7 + # test the merge-sort with a longer permutation + big = list(p) + list(range(p.max() + 1, p.max() + 130)) + assert Permutation(big).inversions() == 7 + assert p.signature() == -1 + assert q.inversions() == 11 + assert q.signature() == -1 + assert rmul(p, ~p).inversions() == 0 + assert rmul(p, ~p).signature() == 1 + + assert p.order() == 6 + assert q.order() == 10 + assert (p**(p.order())).is_Identity + + assert p.length() == 6 + assert q.length() == 7 + assert r.length() == 4 + + assert p.runs() == [[1, 5], [2], [0, 3, 6], [4]] + assert q.runs() == [[4], [2, 3, 5], [0, 6], [1]] + assert r.runs() == [[3], [2], [1], [0]] + + assert p.index() == 8 + assert q.index() == 8 + assert r.index() == 3 + + assert p.get_precedence_distance(q) == q.get_precedence_distance(p) + assert p.get_adjacency_distance(q) == p.get_adjacency_distance(q) + assert p.get_positional_distance(q) == p.get_positional_distance(q) + p = Permutation([0, 1, 2, 3]) + q = Permutation([3, 2, 1, 0]) + assert p.get_precedence_distance(q) == 6 + assert p.get_adjacency_distance(q) == 3 + assert p.get_positional_distance(q) == 8 + p = Permutation([0, 3, 1, 2, 4]) + q = Permutation.josephus(4, 5, 2) + assert p.get_adjacency_distance(q) == 3 + raises(ValueError, lambda: p.get_adjacency_distance(Permutation([]))) + raises(ValueError, lambda: p.get_positional_distance(Permutation([]))) + raises(ValueError, lambda: p.get_precedence_distance(Permutation([]))) + + a = [Permutation.unrank_nonlex(4, i) for i in range(5)] + iden = Permutation([0, 1, 2, 3]) + for i in range(5): + for j in range(i + 1, 5): + assert a[i].commutes_with(a[j]) == \ + (rmul(a[i], a[j]) == rmul(a[j], a[i])) + if a[i].commutes_with(a[j]): + assert a[i].commutator(a[j]) == iden + assert a[j].commutator(a[i]) == iden + + a = Permutation(3) + b = Permutation(0, 6, 3)(1, 2) + assert a.cycle_structure == {1: 4} + assert b.cycle_structure == {2: 1, 3: 1, 1: 2} + # issue 11130 + raises(ValueError, lambda: Permutation(3, size=3)) + raises(ValueError, lambda: Permutation([1, 2, 0, 3], size=3)) + + +def test_Permutation_subclassing(): + # Subclass that adds permutation application on iterables + class CustomPermutation(Permutation): + def __call__(self, *i): + try: + return super().__call__(*i) + except TypeError: + pass + + try: + perm_obj = i[0] + return [self._array_form[j] for j in perm_obj] + except TypeError: + raise TypeError('unrecognized argument') + + def __eq__(self, other): + if isinstance(other, Permutation): + return self._hashable_content() == other._hashable_content() + else: + return super().__eq__(other) + + def __hash__(self): + return super().__hash__() + + p = CustomPermutation([1, 2, 3, 0]) + q = Permutation([1, 2, 3, 0]) + + assert p == q + raises(TypeError, lambda: q([1, 2])) + assert [2, 3] == p([1, 2]) + + assert type(p * q) == CustomPermutation + assert type(q * p) == Permutation # True because q.__mul__(p) is called! + + # Run all tests for the Permutation class also on the subclass + def wrapped_test_Permutation(): + # Monkeypatch the class definition in the globals + globals()['__Perm'] = globals()['Permutation'] + globals()['Permutation'] = CustomPermutation + test_Permutation() + globals()['Permutation'] = globals()['__Perm'] # Restore + del globals()['__Perm'] + + wrapped_test_Permutation() + + +def test_josephus(): + assert Permutation.josephus(4, 6, 1) == Permutation([3, 1, 0, 2, 5, 4]) + assert Permutation.josephus(1, 5, 1).is_Identity + + +def test_ranking(): + assert Permutation.unrank_lex(5, 10).rank() == 10 + p = Permutation.unrank_lex(15, 225) + assert p.rank() == 225 + p1 = p.next_lex() + assert p1.rank() == 226 + assert Permutation.unrank_lex(15, 225).rank() == 225 + assert Permutation.unrank_lex(10, 0).is_Identity + p = Permutation.unrank_lex(4, 23) + assert p.rank() == 23 + assert p.array_form == [3, 2, 1, 0] + assert p.next_lex() is None + + p = Permutation([1, 5, 2, 0, 3, 6, 4]) + q = Permutation([[1, 2, 3, 5, 6], [0, 4]]) + a = [Permutation.unrank_trotterjohnson(4, i).array_form for i in range(5)] + assert a == [[0, 1, 2, 3], [0, 1, 3, 2], [0, 3, 1, 2], [3, 0, 1, + 2], [3, 0, 2, 1] ] + assert [Permutation(pa).rank_trotterjohnson() for pa in a] == list(range(5)) + assert Permutation([0, 1, 2, 3]).next_trotterjohnson() == \ + Permutation([0, 1, 3, 2]) + + assert q.rank_trotterjohnson() == 2283 + assert p.rank_trotterjohnson() == 3389 + assert Permutation([1, 0]).rank_trotterjohnson() == 1 + a = Permutation(list(range(3))) + b = a + l = [] + tj = [] + for i in range(6): + l.append(a) + tj.append(b) + a = a.next_lex() + b = b.next_trotterjohnson() + assert a == b is None + assert {tuple(a) for a in l} == {tuple(a) for a in tj} + + p = Permutation([2, 5, 1, 6, 3, 0, 4]) + q = Permutation([[6], [5], [0, 1, 2, 3, 4]]) + assert p.rank() == 1964 + assert q.rank() == 870 + assert Permutation([]).rank_nonlex() == 0 + prank = p.rank_nonlex() + assert prank == 1600 + assert Permutation.unrank_nonlex(7, 1600) == p + qrank = q.rank_nonlex() + assert qrank == 41 + assert Permutation.unrank_nonlex(7, 41) == Permutation(q.array_form) + + a = [Permutation.unrank_nonlex(4, i).array_form for i in range(24)] + assert a == [ + [1, 2, 3, 0], [3, 2, 0, 1], [1, 3, 0, 2], [1, 2, 0, 3], [2, 3, 1, 0], + [2, 0, 3, 1], [3, 0, 1, 2], [2, 0, 1, 3], [1, 3, 2, 0], [3, 0, 2, 1], + [1, 0, 3, 2], [1, 0, 2, 3], [2, 1, 3, 0], [2, 3, 0, 1], [3, 1, 0, 2], + [2, 1, 0, 3], [3, 2, 1, 0], [0, 2, 3, 1], [0, 3, 1, 2], [0, 2, 1, 3], + [3, 1, 2, 0], [0, 3, 2, 1], [0, 1, 3, 2], [0, 1, 2, 3]] + + N = 10 + p1 = Permutation(a[0]) + for i in range(1, N+1): + p1 = p1*Permutation(a[i]) + p2 = Permutation.rmul_with_af(*[Permutation(h) for h in a[N::-1]]) + assert p1 == p2 + + ok = [] + p = Permutation([1, 0]) + for i in range(3): + ok.append(p.array_form) + p = p.next_nonlex() + if p is None: + ok.append(None) + break + assert ok == [[1, 0], [0, 1], None] + assert Permutation([3, 2, 0, 1]).next_nonlex() == Permutation([1, 3, 0, 2]) + assert [Permutation(pa).rank_nonlex() for pa in a] == list(range(24)) + + +def test_mul(): + a, b = [0, 2, 1, 3], [0, 1, 3, 2] + assert _af_rmul(a, b) == [0, 2, 3, 1] + assert _af_rmuln(a, b, list(range(4))) == [0, 2, 3, 1] + assert rmul(Permutation(a), Permutation(b)).array_form == [0, 2, 3, 1] + + a = Permutation([0, 2, 1, 3]) + b = (0, 1, 3, 2) + c = (3, 1, 2, 0) + assert Permutation.rmul(a, b, c) == Permutation([1, 2, 3, 0]) + assert Permutation.rmul(a, c) == Permutation([3, 2, 1, 0]) + raises(TypeError, lambda: Permutation.rmul(b, c)) + + n = 6 + m = 8 + a = [Permutation.unrank_nonlex(n, i).array_form for i in range(m)] + h = list(range(n)) + for i in range(m): + h = _af_rmul(h, a[i]) + h2 = _af_rmuln(*a[:i + 1]) + assert h == h2 + + +def test_args(): + p = Permutation([(0, 3, 1, 2), (4, 5)]) + assert p._cyclic_form is None + assert Permutation(p) == p + assert p.cyclic_form == [[0, 3, 1, 2], [4, 5]] + assert p._array_form == [3, 2, 0, 1, 5, 4] + p = Permutation((0, 3, 1, 2)) + assert p._cyclic_form is None + assert p._array_form == [0, 3, 1, 2] + assert Permutation([0]) == Permutation((0, )) + assert Permutation([[0], [1]]) == Permutation(((0, ), (1, ))) == \ + Permutation(((0, ), [1])) + assert Permutation([[1, 2]]) == Permutation([0, 2, 1]) + assert Permutation([[1], [4, 2]]) == Permutation([0, 1, 4, 3, 2]) + assert Permutation([[1], [4, 2]], size=1) == Permutation([0, 1, 4, 3, 2]) + assert Permutation( + [[1], [4, 2]], size=6) == Permutation([0, 1, 4, 3, 2, 5]) + assert Permutation([[0, 1], [0, 2]]) == Permutation(0, 1, 2) + assert Permutation([], size=3) == Permutation([0, 1, 2]) + assert Permutation(3).list(5) == [0, 1, 2, 3, 4] + assert Permutation(3).list(-1) == [] + assert Permutation(5)(1, 2).list(-1) == [0, 2, 1] + assert Permutation(5)(1, 2).list() == [0, 2, 1, 3, 4, 5] + raises(ValueError, lambda: Permutation([1, 2], [0])) + # enclosing brackets needed + raises(ValueError, lambda: Permutation([[1, 2], 0])) + # enclosing brackets needed on 0 + raises(ValueError, lambda: Permutation([1, 1, 0])) + raises(ValueError, lambda: Permutation([4, 5], size=10)) # where are 0-3? + # but this is ok because cycles imply that only those listed moved + assert Permutation(4, 5) == Permutation([0, 1, 2, 3, 5, 4]) + + +def test_Cycle(): + assert str(Cycle()) == '()' + assert Cycle(Cycle(1,2)) == Cycle(1, 2) + assert Cycle(1,2).copy() == Cycle(1,2) + assert list(Cycle(1, 3, 2)) == [0, 3, 1, 2] + assert Cycle(1, 2)(2, 3) == Cycle(1, 3, 2) + assert Cycle(1, 2)(2, 3)(4, 5) == Cycle(1, 3, 2)(4, 5) + assert Permutation(Cycle(1, 2)(2, 1, 0, 3)).cyclic_form, Cycle(0, 2, 1) + raises(ValueError, lambda: Cycle().list()) + assert Cycle(1, 2).list() == [0, 2, 1] + assert Cycle(1, 2).list(4) == [0, 2, 1, 3] + assert Cycle(3).list(2) == [0, 1] + assert Cycle(3).list(6) == [0, 1, 2, 3, 4, 5] + assert Permutation(Cycle(1, 2), size=4) == \ + Permutation([0, 2, 1, 3]) + assert str(Cycle(1, 2)(4, 5)) == '(1 2)(4 5)' + assert str(Cycle(1, 2)) == '(1 2)' + assert Cycle(Permutation(list(range(3)))) == Cycle() + assert Cycle(1, 2).list() == [0, 2, 1] + assert Cycle(1, 2).list(4) == [0, 2, 1, 3] + assert Cycle().size == 0 + raises(ValueError, lambda: Cycle((1, 2))) + raises(ValueError, lambda: Cycle(1, 2, 1)) + raises(TypeError, lambda: Cycle(1, 2)*{}) + raises(ValueError, lambda: Cycle(4)[a]) + raises(ValueError, lambda: Cycle(2, -4, 3)) + + # check round-trip + p = Permutation([[1, 2], [4, 3]], size=5) + assert Permutation(Cycle(p)) == p + + +def test_from_sequence(): + assert Permutation.from_sequence('SymPy') == Permutation(4)(0, 1, 3) + assert Permutation.from_sequence('SymPy', key=lambda x: x.lower()) == \ + Permutation(4)(0, 2)(1, 3) + + +def test_resize(): + p = Permutation(0, 1, 2) + assert p.resize(5) == Permutation(0, 1, 2, size=5) + assert p.resize(4) == Permutation(0, 1, 2, size=4) + assert p.resize(3) == p + raises(ValueError, lambda: p.resize(2)) + + p = Permutation(0, 1, 2)(3, 4)(5, 6) + assert p.resize(3) == Permutation(0, 1, 2) + raises(ValueError, lambda: p.resize(4)) + + +def test_printing_cyclic(): + p1 = Permutation([0, 2, 1]) + assert repr(p1) == 'Permutation(1, 2)' + assert str(p1) == '(1 2)' + p2 = Permutation() + assert repr(p2) == 'Permutation()' + assert str(p2) == '()' + p3 = Permutation([1, 2, 0, 3]) + assert repr(p3) == 'Permutation(3)(0, 1, 2)' + + +def test_printing_non_cyclic(): + p1 = Permutation([0, 1, 2, 3, 4, 5]) + assert srepr(p1, perm_cyclic=False) == 'Permutation([], size=6)' + assert sstr(p1, perm_cyclic=False) == 'Permutation([], size=6)' + p2 = Permutation([0, 1, 2]) + assert srepr(p2, perm_cyclic=False) == 'Permutation([0, 1, 2])' + assert sstr(p2, perm_cyclic=False) == 'Permutation([0, 1, 2])' + + p3 = Permutation([0, 2, 1]) + assert srepr(p3, perm_cyclic=False) == 'Permutation([0, 2, 1])' + assert sstr(p3, perm_cyclic=False) == 'Permutation([0, 2, 1])' + p4 = Permutation([0, 1, 3, 2, 4, 5, 6, 7]) + assert srepr(p4, perm_cyclic=False) == 'Permutation([0, 1, 3, 2], size=8)' + + +def test_deprecated_print_cyclic(): + p = Permutation(0, 1, 2) + try: + Permutation.print_cyclic = True + with warns_deprecated_sympy(): + assert sstr(p) == '(0 1 2)' + with warns_deprecated_sympy(): + assert srepr(p) == 'Permutation(0, 1, 2)' + with warns_deprecated_sympy(): + assert pretty(p) == '(0 1 2)' + with warns_deprecated_sympy(): + assert latex(p) == r'\left( 0\; 1\; 2\right)' + + Permutation.print_cyclic = False + with warns_deprecated_sympy(): + assert sstr(p) == 'Permutation([1, 2, 0])' + with warns_deprecated_sympy(): + assert srepr(p) == 'Permutation([1, 2, 0])' + with warns_deprecated_sympy(): + assert pretty(p, use_unicode=False) == '/0 1 2\\\n\\1 2 0/' + with warns_deprecated_sympy(): + assert latex(p) == \ + r'\begin{pmatrix} 0 & 1 & 2 \\ 1 & 2 & 0 \end{pmatrix}' + finally: + Permutation.print_cyclic = None + + +def test_permutation_equality(): + a = Permutation(0, 1, 2) + b = Permutation(0, 1, 2) + assert Eq(a, b) is S.true + c = Permutation(0, 2, 1) + assert Eq(a, c) is S.false + + d = Permutation(0, 1, 2, size=4) + assert unchanged(Eq, a, d) + e = Permutation(0, 2, 1, size=4) + assert unchanged(Eq, a, e) + + i = Permutation() + assert unchanged(Eq, i, 0) + assert unchanged(Eq, 0, i) + + +def test_issue_17661(): + c1 = Cycle(1,2) + c2 = Cycle(1,2) + assert c1 == c2 + assert repr(c1) == 'Cycle(1, 2)' + assert c1 == c2 + + +def test_permutation_apply(): + x = Symbol('x') + p = Permutation(0, 1, 2) + assert p.apply(0) == 1 + assert isinstance(p.apply(0), Integer) + assert p.apply(x) == AppliedPermutation(p, x) + assert AppliedPermutation(p, x).subs(x, 0) == 1 + + x = Symbol('x', integer=False) + raises(NotImplementedError, lambda: p.apply(x)) + x = Symbol('x', negative=True) + raises(NotImplementedError, lambda: p.apply(x)) + + +def test_AppliedPermutation(): + x = Symbol('x') + p = Permutation(0, 1, 2) + raises(ValueError, lambda: AppliedPermutation((0, 1, 2), x)) + assert AppliedPermutation(p, 1, evaluate=True) == 2 + assert AppliedPermutation(p, 1, evaluate=False).__class__ == \ + AppliedPermutation diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py new file mode 100644 index 0000000000000000000000000000000000000000..abf469bb560eef1f378eff4740a84b80b696035f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py @@ -0,0 +1,105 @@ +from sympy.core.symbol import symbols +from sympy.sets.sets import FiniteSet +from sympy.combinatorics.polyhedron import (Polyhedron, + tetrahedron, cube as square, octahedron, dodecahedron, icosahedron, + cube_faces) +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.testing.pytest import raises + +rmul = Permutation.rmul + + +def test_polyhedron(): + raises(ValueError, lambda: Polyhedron(list('ab'), + pgroup=[Permutation([0])])) + pgroup = [Permutation([[0, 7, 2, 5], [6, 1, 4, 3]]), + Permutation([[0, 7, 1, 6], [5, 2, 4, 3]]), + Permutation([[3, 6, 0, 5], [4, 1, 7, 2]]), + Permutation([[7, 4, 5], [1, 3, 0], [2], [6]]), + Permutation([[1, 3, 2], [7, 6, 5], [4], [0]]), + Permutation([[4, 7, 6], [2, 0, 3], [1], [5]]), + Permutation([[1, 2, 0], [4, 5, 6], [3], [7]]), + Permutation([[4, 2], [0, 6], [3, 7], [1, 5]]), + Permutation([[3, 5], [7, 1], [2, 6], [0, 4]]), + Permutation([[2, 5], [1, 6], [0, 4], [3, 7]]), + Permutation([[4, 3], [7, 0], [5, 1], [6, 2]]), + Permutation([[4, 1], [0, 5], [6, 2], [7, 3]]), + Permutation([[7, 2], [3, 6], [0, 4], [1, 5]]), + Permutation([0, 1, 2, 3, 4, 5, 6, 7])] + corners = tuple(symbols('A:H')) + faces = cube_faces + cube = Polyhedron(corners, faces, pgroup) + + assert cube.edges == FiniteSet(*( + (0, 1), (6, 7), (1, 2), (5, 6), (0, 3), (2, 3), + (4, 7), (4, 5), (3, 7), (1, 5), (0, 4), (2, 6))) + + for i in range(3): # add 180 degree face rotations + cube.rotate(cube.pgroup[i]**2) + + assert cube.corners == corners + + for i in range(3, 7): # add 240 degree axial corner rotations + cube.rotate(cube.pgroup[i]**2) + + assert cube.corners == corners + cube.rotate(1) + raises(ValueError, lambda: cube.rotate(Permutation([0, 1]))) + assert cube.corners != corners + assert cube.array_form == [7, 6, 4, 5, 3, 2, 0, 1] + assert cube.cyclic_form == [[0, 7, 1, 6], [2, 4, 3, 5]] + cube.reset() + assert cube.corners == corners + + def check(h, size, rpt, target): + + assert len(h.faces) + len(h.vertices) - len(h.edges) == 2 + assert h.size == size + + got = set() + for p in h.pgroup: + # make sure it restores original + P = h.copy() + hit = P.corners + for i in range(rpt): + P.rotate(p) + if P.corners == hit: + break + else: + print('error in permutation', p.array_form) + for i in range(rpt): + P.rotate(p) + got.add(tuple(P.corners)) + c = P.corners + f = [[c[i] for i in f] for f in P.faces] + assert h.faces == Polyhedron(c, f).faces + assert len(got) == target + assert PermutationGroup([Permutation(g) for g in got]).is_group + + for h, size, rpt, target in zip( + (tetrahedron, square, octahedron, dodecahedron, icosahedron), + (4, 8, 6, 20, 12), + (3, 4, 4, 5, 5), + (12, 24, 24, 60, 60)): + check(h, size, rpt, target) + + +def test_pgroups(): + from sympy.combinatorics.polyhedron import (cube, tetrahedron_faces, + octahedron_faces, dodecahedron_faces, icosahedron_faces) + from sympy.combinatorics.polyhedron import _pgroup_calcs + (tetrahedron2, cube2, octahedron2, dodecahedron2, icosahedron2, + tetrahedron_faces2, cube_faces2, octahedron_faces2, + dodecahedron_faces2, icosahedron_faces2) = _pgroup_calcs() + + assert tetrahedron == tetrahedron2 + assert cube == cube2 + assert octahedron == octahedron2 + assert dodecahedron == dodecahedron2 + assert icosahedron == icosahedron2 + assert sorted(map(sorted, tetrahedron_faces)) == sorted(map(sorted, tetrahedron_faces2)) + assert sorted(cube_faces) == sorted(cube_faces2) + assert sorted(octahedron_faces) == sorted(octahedron_faces2) + assert sorted(dodecahedron_faces) == sorted(dodecahedron_faces2) + assert sorted(icosahedron_faces) == sorted(icosahedron_faces2) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py new file mode 100644 index 0000000000000000000000000000000000000000..b077c7cf3f023a4c36d7039505e6165ab29f275a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py @@ -0,0 +1,74 @@ +from sympy.combinatorics.prufer import Prufer +from sympy.testing.pytest import raises + + +def test_prufer(): + # number of nodes is optional + assert Prufer([[0, 1], [0, 2], [0, 3], [0, 4]], 5).nodes == 5 + assert Prufer([[0, 1], [0, 2], [0, 3], [0, 4]]).nodes == 5 + + a = Prufer([[0, 1], [0, 2], [0, 3], [0, 4]]) + assert a.rank == 0 + assert a.nodes == 5 + assert a.prufer_repr == [0, 0, 0] + + a = Prufer([[2, 4], [1, 4], [1, 3], [0, 5], [0, 4]]) + assert a.rank == 924 + assert a.nodes == 6 + assert a.tree_repr == [[2, 4], [1, 4], [1, 3], [0, 5], [0, 4]] + assert a.prufer_repr == [4, 1, 4, 0] + + assert Prufer.edges([0, 1, 2, 3], [1, 4, 5], [1, 4, 6]) == \ + ([[0, 1], [1, 2], [1, 4], [2, 3], [4, 5], [4, 6]], 7) + assert Prufer([0]*4).size == Prufer([6]*4).size == 1296 + + # accept iterables but convert to list of lists + tree = [(0, 1), (1, 5), (0, 3), (0, 2), (2, 6), (4, 7), (2, 4)] + tree_lists = [list(t) for t in tree] + assert Prufer(tree).tree_repr == tree_lists + assert sorted(Prufer(set(tree)).tree_repr) == sorted(tree_lists) + + raises(ValueError, lambda: Prufer([[1, 2], [3, 4]])) # 0 is missing + raises(ValueError, lambda: Prufer([[2, 3], [3, 4]])) # 0, 1 are missing + assert Prufer(*Prufer.edges([1, 2], [3, 4])).prufer_repr == [1, 3] + raises(ValueError, lambda: Prufer.edges( + [1, 3], [3, 4])) # a broken tree but edges doesn't care + raises(ValueError, lambda: Prufer.edges([1, 2], [5, 6])) + raises(ValueError, lambda: Prufer([[]])) + + a = Prufer([[0, 1], [0, 2], [0, 3]]) + b = a.next() + assert b.tree_repr == [[0, 2], [0, 1], [1, 3]] + assert b.rank == 1 + + +def test_round_trip(): + def doit(t, b): + e, n = Prufer.edges(*t) + t = Prufer(e, n) + a = sorted(t.tree_repr) + b = [i - 1 for i in b] + assert t.prufer_repr == b + assert sorted(Prufer(b).tree_repr) == a + assert Prufer.unrank(t.rank, n).prufer_repr == b + + doit([[1, 2]], []) + doit([[2, 1, 3]], [1]) + doit([[1, 3, 2]], [3]) + doit([[1, 2, 3]], [2]) + doit([[2, 1, 4], [1, 3]], [1, 1]) + doit([[3, 2, 1, 4]], [2, 1]) + doit([[3, 2, 1], [2, 4]], [2, 2]) + doit([[1, 3, 2, 4]], [3, 2]) + doit([[1, 4, 2, 3]], [4, 2]) + doit([[3, 1, 4, 2]], [4, 1]) + doit([[4, 2, 1, 3]], [1, 2]) + doit([[1, 2, 4, 3]], [2, 4]) + doit([[1, 3, 4, 2]], [3, 4]) + doit([[2, 4, 1], [4, 3]], [4, 4]) + doit([[1, 2, 3, 4]], [2, 3]) + doit([[2, 3, 1], [3, 4]], [3, 3]) + doit([[1, 4, 3, 2]], [4, 3]) + doit([[2, 1, 4, 3]], [1, 4]) + doit([[2, 1, 3, 4]], [1, 3]) + doit([[6, 2, 1, 4], [1, 3, 5, 8], [3, 7]], [1, 2, 1, 3, 3, 5]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py new file mode 100644 index 0000000000000000000000000000000000000000..97c562bd57a2cd6318fa1dcb13c6f6278c861cca --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py @@ -0,0 +1,49 @@ +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.free_groups import free_group +from sympy.testing.pytest import raises + + +def test_rewriting(): + F, a, b = free_group("a, b") + G = FpGroup(F, [a*b*a**-1*b**-1]) + a, b = G.generators + R = G._rewriting_system + assert R.is_confluent + + assert G.reduce(b**-1*a) == a*b**-1 + assert G.reduce(b**3*a**4*b**-2*a) == a**5*b + assert G.equals(b**2*a**-1*b, b**4*a**-1*b**-1) + + assert R.reduce_using_automaton(b*a*a**2*b**-1) == a**3 + assert R.reduce_using_automaton(b**3*a**4*b**-2*a) == a**5*b + assert R.reduce_using_automaton(b**-1*a) == a*b**-1 + + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + R = G._rewriting_system + R.make_confluent() + # R._is_confluent should be set to True after + # a successful run of make_confluent + assert R.is_confluent + # but also the system should actually be confluent + assert R._check_confluence() + assert G.reduce(b*a**-1*b**-1*a**3*b**4*a**-1*b**-15) == a**-1*b**-1 + # check for automaton reduction + assert R.reduce_using_automaton(b*a**-1*b**-1*a**3*b**4*a**-1*b**-15) == a**-1*b**-1 + + G = FpGroup(F, [a**2, b**3, (a*b)**4]) + R = G._rewriting_system + assert G.reduce(a**2*b**-2*a**2*b) == b**-1 + assert R.reduce_using_automaton(a**2*b**-2*a**2*b) == b**-1 + assert G.reduce(a**3*b**-2*a**2*b) == a**-1*b**-1 + assert R.reduce_using_automaton(a**3*b**-2*a**2*b) == a**-1*b**-1 + # Check after adding a rule + R.add_rule(a**2, b) + assert R.reduce_using_automaton(a**2*b**-2*a**2*b) == b**-1 + assert R.reduce_using_automaton(a**4*b**-2*a**2*b**3) == b + + R.set_max(15) + raises(RuntimeError, lambda: R.add_rule(a**-3, b)) + R.set_max(20) + R.add_rule(a**-3, b) + + assert R.add_rule(a, a) == set() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py new file mode 100644 index 0000000000000000000000000000000000000000..e6beb9b11fa993a99b71d89b8485050fc3575b8e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py @@ -0,0 +1,55 @@ +from sympy.core import S, Rational +from sympy.combinatorics.schur_number import schur_partition, SchurNumber +from sympy.core.random import _randint +from sympy.testing.pytest import raises +from sympy.core.symbol import symbols + + +def _sum_free_test(subset): + """ + Checks if subset is sum-free(There are no x,y,z in the subset such that + x + y = z) + """ + for i in subset: + for j in subset: + assert (i + j in subset) is False + + +def test_schur_partition(): + raises(ValueError, lambda: schur_partition(S.Infinity)) + raises(ValueError, lambda: schur_partition(-1)) + raises(ValueError, lambda: schur_partition(0)) + assert schur_partition(2) == [[1, 2]] + + random_number_generator = _randint(1000) + for _ in range(5): + n = random_number_generator(1, 1000) + result = schur_partition(n) + t = 0 + numbers = [] + for item in result: + _sum_free_test(item) + """ + Checks if the occurrence of all numbers is exactly one + """ + t += len(item) + for l in item: + assert (l in numbers) is False + numbers.append(l) + assert n == t + + x = symbols("x") + raises(ValueError, lambda: schur_partition(x)) + +def test_schur_number(): + first_known_schur_numbers = {1: 1, 2: 4, 3: 13, 4: 44, 5: 160} + for k in first_known_schur_numbers: + assert SchurNumber(k) == first_known_schur_numbers[k] + + assert SchurNumber(S.Infinity) == S.Infinity + assert SchurNumber(0) == 0 + raises(ValueError, lambda: SchurNumber(0.5)) + + n = symbols("n") + assert SchurNumber(n).lower_bound() == 3**n/2 - Rational(1, 2) + assert SchurNumber(8).lower_bound() == 5039 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py new file mode 100644 index 0000000000000000000000000000000000000000..1d50076da1c685294c2d2561dcc2a6af629eaf83 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py @@ -0,0 +1,63 @@ +from sympy.combinatorics.subsets import Subset, ksubsets +from sympy.testing.pytest import raises + + +def test_subset(): + a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + assert a.next_binary() == Subset(['b'], ['a', 'b', 'c', 'd']) + assert a.prev_binary() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.next_lexicographic() == Subset(['d'], ['a', 'b', 'c', 'd']) + assert a.prev_lexicographic() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.next_gray() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.prev_gray() == Subset(['d'], ['a', 'b', 'c', 'd']) + assert a.rank_binary == 3 + assert a.rank_lexicographic == 14 + assert a.rank_gray == 2 + assert a.cardinality == 16 + assert a.size == 2 + assert Subset.bitlist_from_subset(a, ['a', 'b', 'c', 'd']) == '0011' + + a = Subset([2, 5, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_binary() == Subset([2, 5, 6], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_binary() == Subset([2, 5], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_lexicographic() == Subset([2, 6], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_lexicographic() == Subset([2, 5, 6, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_gray() == Subset([2, 5, 6, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_gray() == Subset([2, 5], [1, 2, 3, 4, 5, 6, 7]) + assert a.rank_binary == 37 + assert a.rank_lexicographic == 93 + assert a.rank_gray == 57 + assert a.cardinality == 128 + + superset = ['a', 'b', 'c', 'd'] + assert Subset.unrank_binary(4, superset).rank_binary == 4 + assert Subset.unrank_gray(10, superset).rank_gray == 10 + + superset = [1, 2, 3, 4, 5, 6, 7, 8, 9] + assert Subset.unrank_binary(33, superset).rank_binary == 33 + assert Subset.unrank_gray(25, superset).rank_gray == 25 + + a = Subset([], ['a', 'b', 'c', 'd']) + i = 1 + while a.subset != Subset(['d'], ['a', 'b', 'c', 'd']).subset: + a = a.next_lexicographic() + i = i + 1 + assert i == 16 + + i = 1 + while a.subset != Subset([], ['a', 'b', 'c', 'd']).subset: + a = a.prev_lexicographic() + i = i + 1 + assert i == 16 + + raises(ValueError, lambda: Subset(['a', 'b'], ['a'])) + raises(ValueError, lambda: Subset(['a'], ['b', 'c'])) + raises(ValueError, lambda: Subset.subset_from_bitlist(['a', 'b'], '010')) + + assert Subset(['a'], ['a', 'b']) != Subset(['b'], ['a', 'b']) + assert Subset(['a'], ['a', 'b']) != Subset(['a'], ['a', 'c']) + +def test_ksubsets(): + assert list(ksubsets([1, 2, 3], 2)) == [(1, 2), (1, 3), (2, 3)] + assert list(ksubsets([1, 2, 3, 4, 5], 2)) == [(1, 2), (1, 3), (1, 4), + (1, 5), (2, 3), (2, 4), (2, 5), (3, 4), (3, 5), (4, 5)] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py new file mode 100644 index 0000000000000000000000000000000000000000..3922419f20b92536426bfaae4b7e94df5db671b5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py @@ -0,0 +1,560 @@ +from sympy.combinatorics.permutations import Permutation, Perm +from sympy.combinatorics.tensor_can import (perm_af_direct_product, dummy_sgs, + riemann_bsgs, get_symmetric_group_sgs, canonicalize, bsgs_direct_product) +from sympy.combinatorics.testutil import canonicalize_naive, graph_certificate +from sympy.testing.pytest import skip, XFAIL + +def test_perm_af_direct_product(): + gens1 = [[1,0,2,3], [0,1,3,2]] + gens2 = [[1,0]] + assert perm_af_direct_product(gens1, gens2, 0) == [[1, 0, 2, 3, 4, 5], [0, 1, 3, 2, 4, 5], [0, 1, 2, 3, 5, 4]] + gens1 = [[1,0,2,3,5,4], [0,1,3,2,4,5]] + gens2 = [[1,0,2,3]] + assert [[1, 0, 2, 3, 4, 5, 7, 6], [0, 1, 3, 2, 4, 5, 6, 7], [0, 1, 2, 3, 5, 4, 6, 7]] + +def test_dummy_sgs(): + a = dummy_sgs([1,2], 0, 4) + assert a == [[0,2,1,3,4,5]] + a = dummy_sgs([2,3,4,5], 0, 8) + assert a == [x._array_form for x in [Perm(9)(2,3), Perm(9)(4,5), + Perm(9)(2,4)(3,5)]] + + a = dummy_sgs([2,3,4,5], 1, 8) + assert a == [x._array_form for x in [Perm(2,3)(8,9), Perm(4,5)(8,9), + Perm(9)(2,4)(3,5)]] + +def test_get_symmetric_group_sgs(): + assert get_symmetric_group_sgs(2) == ([0], [Permutation(3)(0,1)]) + assert get_symmetric_group_sgs(2, 1) == ([0], [Permutation(0,1)(2,3)]) + assert get_symmetric_group_sgs(3) == ([0,1], [Permutation(4)(0,1), Permutation(4)(1,2)]) + assert get_symmetric_group_sgs(3, 1) == ([0,1], [Permutation(0,1)(3,4), Permutation(1,2)(3,4)]) + assert get_symmetric_group_sgs(4) == ([0,1,2], [Permutation(5)(0,1), Permutation(5)(1,2), Permutation(5)(2,3)]) + assert get_symmetric_group_sgs(4, 1) == ([0,1,2], [Permutation(0,1)(4,5), Permutation(1,2)(4,5), Permutation(2,3)(4,5)]) + + +def test_canonicalize_no_slot_sym(): + # cases in which there is no slot symmetry after fixing the + # free indices; here and in the following if the symmetry of the + # metric is not specified, it is assumed to be symmetric. + # If it is not specified, tensors are commuting. + + # A_d0 * B^d0; g = [1,0, 2,3]; T_c = A^d0*B_d0; can = [0,1,2,3] + base1, gens1 = get_symmetric_group_sgs(1) + dummies = [0, 1] + g = Permutation([1,0,2,3]) + can = canonicalize(g, dummies, 0, (base1,gens1,1,0), (base1,gens1,1,0)) + assert can == [0,1,2,3] + # equivalently + can = canonicalize(g, dummies, 0, (base1, gens1, 2, None)) + assert can == [0,1,2,3] + + # with antisymmetric metric; T_c = -A^d0*B_d0; can = [0,1,3,2] + can = canonicalize(g, dummies, 1, (base1,gens1,1,0), (base1,gens1,1,0)) + assert can == [0,1,3,2] + + # A^a * B^b; ord = [a,b]; g = [0,1,2,3]; can = g + g = Permutation([0,1,2,3]) + dummies = [] + t0 = t1 = (base1, gens1, 1, 0) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0,1,2,3] + # B^b * A^a + g = Permutation([1,0,2,3]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [1,0,2,3] + + # A symmetric + # A^{b}_{d0}*A^{d0, a} order a,b,d0,-d0; T_c = A^{a d0}*A{b}_{d0} + # g = [1,3,2,0,4,5]; can = [0,2,1,3,4,5] + base2, gens2 = get_symmetric_group_sgs(2) + dummies = [2,3] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, dummies, 0, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 4, 5] + # with antisymmetric metric + can = canonicalize(g, dummies, 1, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 4, 5] + # A^{a}_{d0}*A^{d0, b} + g = Permutation([0,3,2,1,4,5]) + can = canonicalize(g, dummies, 1, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 5, 4] + + # A, B symmetric + # A^b_d0*B^{d0,a}; g=[1,3,2,0,4,5] + # T_c = A^{b,d0}*B_{a,d0}; can = [1,2,0,3,4,5] + dummies = [2,3] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, dummies, 0, (base2,gens2,1,0), (base2,gens2,1,0)) + assert can == [1,2,0,3,4,5] + # same with antisymmetric metric + can = canonicalize(g, dummies, 1, (base2,gens2,1,0), (base2,gens2,1,0)) + assert can == [1,2,0,3,5,4] + + # A^{d1}_{d0}*B^d0*C_d1 ord=[d0,-d0,d1,-d1]; g = [2,1,0,3,4,5] + # T_c = A^{d0 d1}*B_d0*C_d1; can = [0,2,1,3,4,5] + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + g = Permutation([2,1,0,3,4,5]) + dummies = [0,1,2,3] + t0 = (base2, gens2, 1, 0) + t1 = t2 = (base1, gens1, 1, 0) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [0, 2, 1, 3, 4, 5] + + # A without symmetry + # A^{d1}_{d0}*B^d0*C_d1 ord=[d0,-d0,d1,-d1]; g = [2,1,0,3,4,5] + # T_c = A^{d0 d1}*B_d1*C_d0; can = [0,2,3,1,4,5] + g = Permutation([2,1,0,3,4,5]) + dummies = [0,1,2,3] + t0 = ([], [Permutation(list(range(4)))], 1, 0) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [0,2,3,1,4,5] + # A, B without symmetry + # A^{d1}_{d0}*B_{d1}^{d0}; g = [2,1,3,0,4,5] + # T_c = A^{d0 d1}*B_{d0 d1}; can = [0,2,1,3,4,5] + t0 = t1 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [0,1,2,3] + g = Permutation([2,1,3,0,4,5]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0, 2, 1, 3, 4, 5] + # A_{d0}^{d1}*B_{d1}^{d0}; g = [1,2,3,0,4,5] + # T_c = A^{d0 d1}*B_{d1 d0}; can = [0,2,3,1,4,5] + g = Permutation([1,2,3,0,4,5]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0,2,3,1,4,5] + + # A, B, C without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c=A^{d0 d1}*B_{a d1}*C_{d0 b}; can = [2,4,0,5,3,1,6,7] + t0 = t1 = t2 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,5,3,1,6,7] + + # A symmetric, B and C without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = A^{d0 d1}*B_{a d0}*C_{d1 b}; can = [2,4,0,3,5,1,6,7] + t0 = (base2,gens2,1,0) + t1 = t2 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,5,1,6,7] + + # A and C symmetric, B without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = A^{d0 d1}*B_{a d0}*C_{b d1}; can = [2,4,0,3,1,5,6,7] + t0 = t2 = (base2,gens2,1,0) + t1 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,1,5,6,7] + + # A symmetric, B without symmetry, C antisymmetric + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = -A^{d0 d1}*B_{a d0}*C_{b d1}; can = [2,4,0,3,1,5,7,6] + t0 = (base2,gens2, 1, 0) + t1 = ([], [Permutation(list(range(4)))], 1, 0) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + t2 = (base2a, gens2a, 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,1,5,7,6] + + +def test_canonicalize_no_dummies(): + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + + # A commuting + # A^c A^b A^a; ord = [a,b,c]; g = [2,1,0,3,4] + # T_c = A^a A^b A^c; can = list(range(5)) + g = Permutation([2,1,0,3,4]) + can = canonicalize(g, [], 0, (base1, gens1, 3, 0)) + assert can == list(range(5)) + + # A anticommuting + # A^c A^b A^a; ord = [a,b,c]; g = [2,1,0,3,4] + # T_c = -A^a A^b A^c; can = [0,1,2,4,3] + g = Permutation([2,1,0,3,4]) + can = canonicalize(g, [], 0, (base1, gens1, 3, 1)) + assert can == [0,1,2,4,3] + + # A commuting and symmetric + # A^{b,d}*A^{c,a}; ord = [a,b,c,d]; g = [1,3,2,0,4,5] + # T_c = A^{a c}*A^{b d}; can = [0,2,1,3,4,5] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 0)) + assert can == [0,2,1,3,4,5] + + # A anticommuting and symmetric + # A^{b,d}*A^{c,a}; ord = [a,b,c,d]; g = [1,3,2,0,4,5] + # T_c = -A^{a c}*A^{b d}; can = [0,2,1,3,5,4] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 1)) + assert can == [0,2,1,3,5,4] + # A^{c,a}*A^{b,d} ; g = [2,0,1,3,4,5] + # T_c = A^{a c}*A^{b d}; can = [0,2,1,3,4,5] + g = Permutation([2,0,1,3,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 1)) + assert can == [0,2,1,3,4,5] + +def test_no_metric_symmetry(): + # no metric symmetry + # A^d1_d0 * A^d0_d1; ord = [d0,-d0,d1,-d1]; g= [2,1,0,3,4,5] + # T_c = A^d0_d1 * A^d1_d0; can = [0,3,2,1,4,5] + g = Permutation([2,1,0,3,4,5]) + can = canonicalize(g, list(range(4)), None, [[], [Permutation(list(range(4)))], 2, 0]) + assert can == [0,3,2,1,4,5] + + # A^d1_d2 * A^d0_d3 * A^d2_d1 * A^d3_d0 + # ord = [d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # 0 1 2 3 4 5 6 7 + # g = [2,5,0,7,4,3,6,1,8,9] + # T_c = A^d0_d1 * A^d1_d0 * A^d2_d3 * A^d3_d2 + # can = [0,3,2,1,4,7,6,5,8,9] + g = Permutation([2,5,0,7,4,3,6,1,8,9]) + #can = canonicalize(g, list(range(8)), 0, [[], [list(range(4))], 4, 0]) + #assert can == [0, 2, 3, 1, 4, 6, 7, 5, 8, 9] + can = canonicalize(g, list(range(8)), None, [[], [Permutation(list(range(4)))], 4, 0]) + assert can == [0, 3, 2, 1, 4, 7, 6, 5, 8, 9] + + # A^d0_d2 * A^d1_d3 * A^d3_d0 * A^d2_d1 + # g = [0,5,2,7,6,1,4,3,8,9] + # T_c = A^d0_d1 * A^d1_d2 * A^d2_d3 * A^d3_d0 + # can = [0,3,2,5,4,7,6,1,8,9] + g = Permutation([0,5,2,7,6,1,4,3,8,9]) + can = canonicalize(g, list(range(8)), None, [[], [Permutation(list(range(4)))], 4, 0]) + assert can == [0,3,2,5,4,7,6,1,8,9] + + g = Permutation([12,7,10,3,14,13,4,11,6,1,2,9,0,15,8,5,16,17]) + can = canonicalize(g, list(range(16)), None, [[], [Permutation(list(range(4)))], 8, 0]) + assert can == [0,3,2,5,4,7,6,1,8,11,10,13,12,15,14,9,16,17] + +def test_canonical_free(): + # t = A^{d0 a1}*A_d0^a0 + # ord = [a0,a1,d0,-d0]; g = [2,1,3,0,4,5]; dummies = [[2,3]] + # t_c = A_d0^a0*A^{d0 a1} + # can = [3,0, 2,1, 4,5] + g = Permutation([2,1,3,0,4,5]) + dummies = [[2,3]] + can = canonicalize(g, dummies, [None], ([], [Permutation(3)], 2, 0)) + assert can == [3,0, 2,1, 4,5] + +def test_canonicalize1(): + base1, gens1 = get_symmetric_group_sgs(1) + base1a, gens1a = get_symmetric_group_sgs(1, 1) + base2, gens2 = get_symmetric_group_sgs(2) + base3, gens3 = get_symmetric_group_sgs(3) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + base3a, gens3a = get_symmetric_group_sgs(3, 1) + + # A_d0*A^d0; ord = [d0,-d0]; g = [1,0,2,3] + # T_c = A^d0*A_d0; can = [0,1,2,3] + g = Permutation([1,0,2,3]) + can = canonicalize(g, [0, 1], 0, (base1, gens1, 2, 0)) + assert can == list(range(4)) + + # A commuting + # A_d0*A_d1*A_d2*A^d2*A^d1*A^d0; ord=[d0,-d0,d1,-d1,d2,-d2] + # g = [1,3,5,4,2,0,6,7] + # T_c = A^d0*A_d0*A^d1*A_d1*A^d2*A_d2; can = list(range(8)) + g = Permutation([1,3,5,4,2,0,6,7]) + can = canonicalize(g, list(range(6)), 0, (base1, gens1, 6, 0)) + assert can == list(range(8)) + + # A anticommuting + # A_d0*A_d1*A_d2*A^d2*A^d1*A^d0; ord=[d0,-d0,d1,-d1,d2,-d2] + # g = [1,3,5,4,2,0,6,7] + # T_c 0; can = 0 + g = Permutation([1,3,5,4,2,0,6,7]) + can = canonicalize(g, list(range(6)), 0, (base1, gens1, 6, 1)) + assert can == 0 + can1 = canonicalize_naive(g, list(range(6)), 0, (base1, gens1, 6, 1)) + assert can1 == 0 + + # A commuting symmetric + # A^{d0 b}*A^a_d1*A^d1_d0; ord=[a,b,d0,-d0,d1,-d1] + # g = [2,1,0,5,4,3,6,7] + # T_c = A^{a d0}*A^{b d1}*A_{d0 d1}; can = [0,2,1,4,3,5,6,7] + g = Permutation([2,1,0,5,4,3,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base2, gens2, 3, 0)) + assert can == [0,2,1,4,3,5,6,7] + + # A, B commuting symmetric + # A^{d0 b}*A^d1_d0*B^a_d1; ord=[a,b,d0,-d0,d1,-d1] + # g = [2,1,4,3,0,5,6,7] + # T_c = A^{b d0}*A_d0^d1*B^a_d1; can = [1,2,3,4,0,5,6,7] + g = Permutation([2,1,4,3,0,5,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base2,gens2,2,0), (base2,gens2,1,0)) + assert can == [1,2,3,4,0,5,6,7] + + # A commuting symmetric + # A^{d1 d0 b}*A^{a}_{d1 d0}; ord=[a,b, d0,-d0,d1,-d1] + # g = [4,2,1,0,5,3,6,7] + # T_c = A^{a d0 d1}*A^{b}_{d0 d1}; can = [0,2,4,1,3,5,6,7] + g = Permutation([4,2,1,0,5,3,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base3, gens3, 2, 0)) + assert can == [0,2,4,1,3,5,6,7] + + + # A^{d3 d0 d2}*A^a0_{d1 d2}*A^d1_d3^a1*A^{a2 a3}_d0 + # ord = [a0,a1,a2,a3,d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # 0 1 2 3 4 5 6 7 8 9 10 11 + # g = [10,4,8, 0,7,9, 6,11,1, 2,3,5, 12,13] + # T_c = A^{a0 d0 d1}*A^a1_d0^d2*A^{a2 a3 d3}*A_{d1 d2 d3} + # can = [0,4,6, 1,5,8, 2,3,10, 7,9,11, 12,13] + g = Permutation([10,4,8, 0,7,9, 6,11,1, 2,3,5, 12,13]) + can = canonicalize(g, list(range(4,12)), 0, (base3, gens3, 4, 0)) + assert can == [0,4,6, 1,5,8, 2,3,10, 7,9,11, 12,13] + + # A commuting symmetric, B antisymmetric + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # ord = [d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # g = [0,2,4,5,7,3,1,6,8,9] + # in this esxample and in the next three, + # renaming dummy indices and using symmetry of A, + # T = A^{d0 d1 d2} * A_{d0 d1 d3} * B_d2^d3 + # can = 0 + g = Permutation([0,2,4,5,7,3,1,6,8,9]) + can = canonicalize(g, list(range(8)), 0, (base3, gens3,2,0), (base2a,gens2a,1,0)) + assert can == 0 + # A anticommuting symmetric, B anticommuting + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = A^{d0 d1 d2} * A_{d0 d1}^d3 * B_{d2 d3} + # can = [0,2,4, 1,3,6, 5,7, 8,9] + can = canonicalize(g, list(range(8)), 0, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4, 1,3,6, 5,7, 8,9] + # A anticommuting symmetric, B antisymmetric commuting, antisymmetric metric + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = -A^{d0 d1 d2} * A_{d0 d1}^d3 * B_{d2 d3} + # can = [0,2,4, 1,3,6, 5,7, 9,8] + can = canonicalize(g, list(range(8)), 1, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4, 1,3,6, 5,7, 9,8] + + # A anticommuting symmetric, B anticommuting anticommuting, + # no metric symmetry + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = A^{d0 d1 d2} * A_{d0 d1 d3} * B_d2^d3 + # can = [0,2,4, 1,3,7, 5,6, 8,9] + can = canonicalize(g, list(range(8)), None, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4,1,3,7,5,6,8,9] + + # Gamma anticommuting + # Gamma_{mu nu} * gamma^rho * Gamma^{nu mu alpha} + # ord = [alpha, rho, mu,-mu,nu,-nu] + # g = [3,5,1,4,2,0,6,7] + # T_c = -Gamma^{mu nu} * gamma^rho * Gamma_{alpha mu nu} + # can = [2,4,1,0,3,5,7,6]] + g = Permutation([3,5,1,4,2,0,6,7]) + t0 = (base2a, gens2a, 1, None) + t1 = (base1, gens1, 1, None) + t2 = (base3a, gens3a, 1, None) + can = canonicalize(g, list(range(2, 6)), 0, t0, t1, t2) + assert can == [2,4,1,0,3,5,7,6] + + # Gamma_{mu nu} * Gamma^{gamma beta} * gamma_rho * Gamma^{nu mu alpha} + # ord = [alpha, beta, gamma, -rho, mu,-mu,nu,-nu] + # 0 1 2 3 4 5 6 7 + # g = [5,7,2,1,3,6,4,0,8,9] + # T_c = Gamma^{mu nu} * Gamma^{beta gamma} * gamma_rho * Gamma^alpha_{mu nu} # can = [4,6,1,2,3,0,5,7,8,9] + t0 = (base2a, gens2a, 2, None) + g = Permutation([5,7,2,1,3,6,4,0,8,9]) + can = canonicalize(g, list(range(4, 8)), 0, t0, t1, t2) + assert can == [4,6,1,2,3,0,5,7,8,9] + + # f^a_{b,c} antisymmetric in b,c; A_mu^a no symmetry + # f^c_{d a} * f_{c e b} * A_mu^d * A_nu^a * A^{nu e} * A^{mu b} + # ord = [mu,-mu,nu,-nu,a,-a,b,-b,c,-c,d,-d, e, -e] + # 0 1 2 3 4 5 6 7 8 9 10 11 12 13 + # g = [8,11,5, 9,13,7, 1,10, 3,4, 2,12, 0,6, 14,15] + # T_c = -f^{a b c} * f_a^{d e} * A^mu_b * A_{mu d} * A^nu_c * A_{nu e} + # can = [4,6,8, 5,10,12, 0,7, 1,11, 2,9, 3,13, 15,14] + g = Permutation([8,11,5, 9,13,7, 1,10, 3,4, 2,12, 0,6, 14,15]) + base_f, gens_f = bsgs_direct_product(base1, gens1, base2a, gens2a) + base_A, gens_A = bsgs_direct_product(base1, gens1, base1, gens1) + t0 = (base_f, gens_f, 2, 0) + t1 = (base_A, gens_A, 4, 0) + can = canonicalize(g, [list(range(4)), list(range(4, 14))], [0, 0], t0, t1) + assert can == [4,6,8, 5,10,12, 0,7, 1,11, 2,9, 3,13, 15,14] + + +def test_riemann_invariants(): + baser, gensr = riemann_bsgs + # R^{d0 d1}_{d1 d0}; ord = [d0,-d0,d1,-d1]; g = [0,2,3,1,4,5] + # T_c = -R^{d0 d1}_{d0 d1}; can = [0,2,1,3,5,4] + g = Permutation([0,2,3,1,4,5]) + can = canonicalize(g, list(range(2, 4)), 0, (baser, gensr, 1, 0)) + assert can == [0,2,1,3,5,4] + # use a non minimal BSGS + can = canonicalize(g, list(range(2, 4)), 0, ([2, 0], [Permutation([1,0,2,3,5,4]), Permutation([2,3,0,1,4,5])], 1, 0)) + assert can == [0,2,1,3,5,4] + + """ + The following tests in test_riemann_invariants and in + test_riemann_invariants1 have been checked using xperm.c from XPerm in + in [1] and with an older version contained in [2] + + [1] xperm.c part of xPerm written by J. M. Martin-Garcia + http://www.xact.es/index.html + [2] test_xperm.cc in cadabra by Kasper Peeters, http://cadabra.phi-sci.com/ + """ + # R_d11^d1_d0^d5 * R^{d6 d4 d0}_d5 * R_{d7 d2 d8 d9} * + # R_{d10 d3 d6 d4} * R^{d2 d7 d11}_d1 * R^{d8 d9 d3 d10} + # ord: contravariant d_k ->2*k, covariant d_k -> 2*k+1 + # T_c = R^{d0 d1 d2 d3} * R_{d0 d1}^{d4 d5} * R_{d2 d3}^{d6 d7} * + # R_{d4 d5}^{d8 d9} * R_{d6 d7}^{d10 d11} * R_{d8 d9 d10 d11} + g = Permutation([23,2,1,10,12,8,0,11,15,5,17,19,21,7,13,9,4,14,22,3,16,18,6,20,24,25]) + can = canonicalize(g, list(range(24)), 0, (baser, gensr, 6, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,21,23,24,25] + + # use a non minimal BSGS + can = canonicalize(g, list(range(24)), 0, ([2, 0], [Permutation([1,0,2,3,5,4]), Permutation([2,3,0,1,4,5])], 6, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,21,23,24,25] + + g = Permutation([0,2,5,7,4,6,9,11,8,10,13,15,12,14,17,19,16,18,21,23,20,22,25,27,24,26,29,31,28,30,33,35,32,34,37,39,36,38,1,3,40,41]) + can = canonicalize(g, list(range(40)), 0, (baser, gensr, 10, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,24,26,21,23,28,30,25,27,32,34,29,31,36,38,33,35,37,39,40,41] + + +@XFAIL +def test_riemann_invariants1(): + skip('takes too much time') + baser, gensr = riemann_bsgs + g = Permutation([17, 44, 11, 3, 0, 19, 23, 15, 38, 4, 25, 27, 43, 36, 22, 14, 8, 30, 41, 20, 2, 10, 12, 28, 18, 1, 29, 13, 37, 42, 33, 7, 9, 31, 24, 26, 39, 5, 34, 47, 32, 6, 21, 40, 35, 46, 45, 16, 48, 49]) + can = canonicalize(g, list(range(48)), 0, (baser, gensr, 12, 0)) + assert can == [0, 2, 4, 6, 1, 3, 8, 10, 5, 7, 12, 14, 9, 11, 16, 18, 13, 15, 20, 22, 17, 19, 24, 26, 21, 23, 28, 30, 25, 27, 32, 34, 29, 31, 36, 38, 33, 35, 40, 42, 37, 39, 44, 46, 41, 43, 45, 47, 48, 49] + + g = Permutation([0,2,4,6, 7,8,10,12, 14,16,18,20, 19,22,24,26, 5,21,28,30, 32,34,36,38, 40,42,44,46, 13,48,50,52, 15,49,54,56, 17,33,41,58, 9,23,60,62, 29,35,63,64, 3,45,66,68, 25,37,47,57, 11,31,69,70, 27,39,53,72, 1,59,73,74, 55,61,67,76, 43,65,75,78, 51,71,77,79, 80,81]) + can = canonicalize(g, list(range(80)), 0, (baser, gensr, 20, 0)) + assert can == [0,2,4,6, 1,8,10,12, 3,14,16,18, 5,20,22,24, 7,26,28,30, 9,15,32,34, 11,36,23,38, 13,40,42,44, 17,39,29,46, 19,48,43,50, 21,45,52,54, 25,56,33,58, 27,60,53,62, 31,51,64,66, 35,65,47,68, 37,70,49,72, 41,74,57,76, 55,67,59,78, 61,69,71,75, 63,79,73,77, 80,81] + + +def test_riemann_products(): + baser, gensr = riemann_bsgs + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + + # R^{a b d0}_d0 = 0 + g = Permutation([0,1,2,3,4,5]) + can = canonicalize(g, list(range(2,4)), 0, (baser, gensr, 1, 0)) + assert can == 0 + + # R^{d0 b a}_d0 ; ord = [a,b,d0,-d0}; g = [2,1,0,3,4,5] + # T_c = -R^{a d0 b}_d0; can = [0,2,1,3,5,4] + g = Permutation([2,1,0,3,4,5]) + can = canonicalize(g, list(range(2, 4)), 0, (baser, gensr, 1, 0)) + assert can == [0,2,1,3,5,4] + + # R^d1_d2^b_d0 * R^{d0 a}_d1^d2; ord=[a,b,d0,-d0,d1,-d1,d2,-d2] + # g = [4,7,1,3,2,0,5,6,8,9] + # T_c = -R^{a d0 d1 d2}* R^b_{d0 d1 d2} + # can = [0,2,4,6,1,3,5,7,9,8] + g = Permutation([4,7,1,3,2,0,5,6,8,9]) + can = canonicalize(g, list(range(2,8)), 0, (baser, gensr, 2, 0)) + assert can == [0,2,4,6,1,3,5,7,9,8] + can1 = canonicalize_naive(g, list(range(2,8)), 0, (baser, gensr, 2, 0)) + assert can == can1 + + # A symmetric commuting + # R^{d6 d5}_d2^d1 * R^{d4 d0 d2 d3} * A_{d6 d0} A_{d3 d1} * A_{d4 d5} + # g = [12,10,5,2, 8,0,4,6, 13,1, 7,3, 9,11,14,15] + # T_c = -R^{d0 d1 d2 d3} * R_d0^{d4 d5 d6} * A_{d1 d4}*A_{d2 d5}*A_{d3 d6} + + g = Permutation([12,10,5,2,8,0,4,6,13,1,7,3,9,11,14,15]) + can = canonicalize(g, list(range(14)), 0, ((baser,gensr,2,0)), (base2,gens2,3,0)) + assert can == [0, 2, 4, 6, 1, 8, 10, 12, 3, 9, 5, 11, 7, 13, 15, 14] + + # R^{d2 a0 a2 d0} * R^d1_d2^{a1 a3} * R^{a4 a5}_{d0 d1} + # ord = [a0,a1,a2,a3,a4,a5,d0,-d0,d1,-d1,d2,-d2] + # 0 1 2 3 4 5 6 7 8 9 10 11 + # can = [0, 6, 2, 8, 1, 3, 7, 10, 4, 5, 9, 11, 12, 13] + # T_c = R^{a0 d0 a2 d1}*R^{a1 a3}_d0^d2*R^{a4 a5}_{d1 d2} + g = Permutation([10,0,2,6,8,11,1,3,4,5,7,9,12,13]) + can = canonicalize(g, list(range(6,12)), 0, (baser, gensr, 3, 0)) + assert can == [0, 6, 2, 8, 1, 3, 7, 10, 4, 5, 9, 11, 12, 13] + #can1 = canonicalize_naive(g, list(range(6,12)), 0, (baser, gensr, 3, 0)) + #assert can == can1 + + # A^n_{i, j} antisymmetric in i,j + # A_m0^d0_a1 * A_m1^a0_d0; ord = [m0,m1,a0,a1,d0,-d0] + # g = [0,4,3,1,2,5,6,7] + # T_c = -A_{m a1}^d0 * A_m1^a0_d0 + # can = [0,3,4,1,2,5,7,6] + base, gens = bsgs_direct_product(base1, gens1, base2a, gens2a) + dummies = list(range(4, 6)) + g = Permutation([0,4,3,1,2,5,6,7]) + can = canonicalize(g, dummies, 0, (base, gens, 2, 0)) + assert can == [0, 3, 4, 1, 2, 5, 7, 6] + + + # A^n_{i, j} symmetric in i,j + # A^m0_a0^d2 * A^n0_d2^d1 * A^n1_d1^d0 * A_{m0 d0}^a1 + # ordering: first the free indices; then first n, then d + # ord=[n0,n1,a0,a1, m0,-m0,d0,-d0,d1,-d1,d2,-d2] + # 0 1 2 3 4 5 6 7 8 9 10 11] + # g = [4,2,10, 0,11,8, 1,9,6, 5,7,3, 12,13] + # if the dummy indices m_i and d_i were separated, + # one gets + # T_c = A^{n0 d0 d1} * A^n1_d0^d2 * A^m0^a0_d1 * A_m0^a1_d2 + # can = [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 12, 13] + # If they are not, so can is + # T_c = A^{n0 m0 d0} A^n1_m0^d1 A^{d2 a0}_d0 A_d2^a1_d1 + # can = [0, 4, 6, 1, 5, 8, 10, 2, 7, 11, 3, 9, 12, 13] + # case with single type of indices + + base, gens = bsgs_direct_product(base1, gens1, base2, gens2) + dummies = list(range(4, 12)) + g = Permutation([4,2,10, 0,11,8, 1,9,6, 5,7,3, 12,13]) + can = canonicalize(g, dummies, 0, (base, gens, 4, 0)) + assert can == [0, 4, 6, 1, 5, 8, 10, 2, 7, 11, 3, 9, 12, 13] + # case with separated indices + dummies = [list(range(4, 6)), list(range(6,12))] + sym = [0, 0] + can = canonicalize(g, dummies, sym, (base, gens, 4, 0)) + assert can == [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 12, 13] + # case with separated indices with the second type of index + # with antisymmetric metric: there is a sign change + sym = [0, 1] + can = canonicalize(g, dummies, sym, (base, gens, 4, 0)) + assert can == [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 13, 12] + +def test_graph_certificate(): + # test tensor invariants constructed from random regular graphs; + # checked graph isomorphism with networkx + import random + def randomize_graph(size, g): + p = list(range(size)) + random.shuffle(p) + g1a = {} + for k, v in g1.items(): + g1a[p[k]] = [p[i] for i in v] + return g1a + + g1 = {0: [2, 3, 7], 1: [4, 5, 7], 2: [0, 4, 6], 3: [0, 6, 7], 4: [1, 2, 5], 5: [1, 4, 6], 6: [2, 3, 5], 7: [0, 1, 3]} + g2 = {0: [2, 3, 7], 1: [2, 4, 5], 2: [0, 1, 5], 3: [0, 6, 7], 4: [1, 5, 6], 5: [1, 2, 4], 6: [3, 4, 7], 7: [0, 3, 6]} + + c1 = graph_certificate(g1) + c2 = graph_certificate(g2) + assert c1 != c2 + g1a = randomize_graph(8, g1) + c1a = graph_certificate(g1a) + assert c1 == c1a + + g1 = {0: [8, 1, 9, 7], 1: [0, 9, 3, 4], 2: [3, 4, 6, 7], 3: [1, 2, 5, 6], 4: [8, 1, 2, 5], 5: [9, 3, 4, 7], 6: [8, 2, 3, 7], 7: [0, 2, 5, 6], 8: [0, 9, 4, 6], 9: [8, 0, 5, 1]} + g2 = {0: [1, 2, 5, 6], 1: [0, 9, 5, 7], 2: [0, 4, 6, 7], 3: [8, 9, 6, 7], 4: [8, 2, 6, 7], 5: [0, 9, 8, 1], 6: [0, 2, 3, 4], 7: [1, 2, 3, 4], 8: [9, 3, 4, 5], 9: [8, 1, 3, 5]} + c1 = graph_certificate(g1) + c2 = graph_certificate(g2) + assert c1 != c2 + g1a = randomize_graph(10, g1) + c1a = graph_certificate(g1a) + assert c1 == c1a diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py new file mode 100644 index 0000000000000000000000000000000000000000..736e7a4ff86967e41dca71cf12de6c387a82d26d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py @@ -0,0 +1,55 @@ +from sympy.combinatorics.named_groups import SymmetricGroup, AlternatingGroup,\ + CyclicGroup +from sympy.combinatorics.testutil import _verify_bsgs, _cmp_perm_lists,\ + _naive_list_centralizer, _verify_centralizer,\ + _verify_normal_closure +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.core.random import shuffle + + +def test_cmp_perm_lists(): + S = SymmetricGroup(4) + els = list(S.generate_dimino()) + other = els.copy() + shuffle(other) + assert _cmp_perm_lists(els, other) is True + + +def test_naive_list_centralizer(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert _naive_list_centralizer(S, S) == [Permutation([0, 1, 2])] + assert PermutationGroup(_naive_list_centralizer(S, A)).is_subgroup(A) + + +def test_verify_bsgs(): + S = SymmetricGroup(5) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + assert _verify_bsgs(S, base, strong_gens) is True + assert _verify_bsgs(S, base[:-1], strong_gens) is False + assert _verify_bsgs(S, base, S.generators) is False + + +def test_verify_centralizer(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert _verify_centralizer(S, S, centr=triv) + assert _verify_centralizer(S, A, centr=A) + + +def test_verify_normal_closure(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert _verify_normal_closure(S, A, closure=A) + S = SymmetricGroup(5) + A = AlternatingGroup(5) + C = CyclicGroup(5) + assert _verify_normal_closure(S, A, closure=A) + assert _verify_normal_closure(S, C, closure=A) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py new file mode 100644 index 0000000000000000000000000000000000000000..bca183e81f354e398aee9ae809fe79b20c7f2468 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py @@ -0,0 +1,120 @@ +from sympy.combinatorics.named_groups import SymmetricGroup, DihedralGroup,\ + AlternatingGroup +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.util import _check_cycles_alt_sym, _strip,\ + _distribute_gens_by_base, _strong_gens_from_distr,\ + _orbits_transversals_from_bsgs, _handle_precomputed_bsgs, _base_ordering,\ + _remove_gens +from sympy.combinatorics.testutil import _verify_bsgs + + +def test_check_cycles_alt_sym(): + perm1 = Permutation([[0, 1, 2, 3, 4, 5, 6], [7], [8], [9]]) + perm2 = Permutation([[0, 1, 2, 3, 4, 5], [6, 7, 8, 9]]) + perm3 = Permutation([[0, 1, 2, 3, 4], [5, 6, 7, 8, 9]]) + assert _check_cycles_alt_sym(perm1) is True + assert _check_cycles_alt_sym(perm2) is False + assert _check_cycles_alt_sym(perm3) is False + + +def test_strip(): + D = DihedralGroup(5) + D.schreier_sims() + member = Permutation([4, 0, 1, 2, 3]) + not_member1 = Permutation([0, 1, 4, 3, 2]) + not_member2 = Permutation([3, 1, 4, 2, 0]) + identity = Permutation([0, 1, 2, 3, 4]) + res1 = _strip(member, D.base, D.basic_orbits, D.basic_transversals) + res2 = _strip(not_member1, D.base, D.basic_orbits, D.basic_transversals) + res3 = _strip(not_member2, D.base, D.basic_orbits, D.basic_transversals) + assert res1[0] == identity + assert res1[1] == len(D.base) + 1 + assert res2[0] == not_member1 + assert res2[1] == len(D.base) + 1 + assert res3[0] != identity + assert res3[1] == 2 + + +def test_distribute_gens_by_base(): + base = [0, 1, 2] + gens = [Permutation([0, 1, 2, 3]), Permutation([0, 1, 3, 2]), + Permutation([0, 2, 3, 1]), Permutation([3, 2, 1, 0])] + assert _distribute_gens_by_base(base, gens) == [gens, + [Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2]), + Permutation([0, 2, 3, 1])], + [Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2])]] + + +def test_strong_gens_from_distr(): + strong_gens_distr = [[Permutation([0, 2, 1]), Permutation([1, 2, 0]), + Permutation([1, 0, 2])], [Permutation([0, 2, 1])]] + assert _strong_gens_from_distr(strong_gens_distr) == \ + [Permutation([0, 2, 1]), + Permutation([1, 2, 0]), + Permutation([1, 0, 2])] + + +def test_orbits_transversals_from_bsgs(): + S = SymmetricGroup(4) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + result = _orbits_transversals_from_bsgs(base, strong_gens_distr) + orbits = result[0] + transversals = result[1] + base_len = len(base) + for i in range(base_len): + for el in orbits[i]: + assert transversals[i][el](base[i]) == el + for j in range(i): + assert transversals[i][el](base[j]) == base[j] + order = 1 + for i in range(base_len): + order *= len(orbits[i]) + assert S.order() == order + + +def test_handle_precomputed_bsgs(): + A = AlternatingGroup(5) + A.schreier_sims() + base = A.base + strong_gens = A.strong_gens + result = _handle_precomputed_bsgs(base, strong_gens) + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + assert strong_gens_distr == result[2] + transversals = result[0] + orbits = result[1] + base_len = len(base) + for i in range(base_len): + for el in orbits[i]: + assert transversals[i][el](base[i]) == el + for j in range(i): + assert transversals[i][el](base[j]) == base[j] + order = 1 + for i in range(base_len): + order *= len(orbits[i]) + assert A.order() == order + + +def test_base_ordering(): + base = [2, 4, 5] + degree = 7 + assert _base_ordering(base, degree) == [3, 4, 0, 5, 1, 2, 6] + + +def test_remove_gens(): + S = SymmetricGroup(10) + base, strong_gens = S.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(S, base, new_gens) is True + A = AlternatingGroup(7) + base, strong_gens = A.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(A, base, new_gens) is True + D = DihedralGroup(2) + base, strong_gens = D.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(D, base, new_gens) is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/util.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/util.py new file mode 100644 index 0000000000000000000000000000000000000000..fc73b02f94f4aae6f1b98bb3f0c837fd5a1d1e6d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/combinatorics/util.py @@ -0,0 +1,532 @@ +from sympy.combinatorics.permutations import Permutation, _af_invert, _af_rmul +from sympy.ntheory import isprime + +rmul = Permutation.rmul +_af_new = Permutation._af_new + +############################################ +# +# Utilities for computational group theory +# +############################################ + + +def _base_ordering(base, degree): + r""" + Order `\{0, 1, \dots, n-1\}` so that base points come first and in order. + + Parameters + ========== + + base : the base + degree : the degree of the associated permutation group + + Returns + ======= + + A list ``base_ordering`` such that ``base_ordering[point]`` is the + number of ``point`` in the ordering. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _base_ordering + >>> S = SymmetricGroup(4) + >>> S.schreier_sims() + >>> _base_ordering(S.base, S.degree) + [0, 1, 2, 3] + + Notes + ===== + + This is used in backtrack searches, when we define a relation `\ll` on + the underlying set for a permutation group of degree `n`, + `\{0, 1, \dots, n-1\}`, so that if `(b_1, b_2, \dots, b_k)` is a base we + have `b_i \ll b_j` whenever `i>> from sympy.combinatorics.util import _check_cycles_alt_sym + >>> from sympy.combinatorics import Permutation + >>> a = Permutation([[0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10], [11, 12]]) + >>> _check_cycles_alt_sym(a) + False + >>> b = Permutation([[0, 1, 2, 3, 4, 5, 6], [7, 8, 9, 10]]) + >>> _check_cycles_alt_sym(b) + True + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.is_alt_sym + + """ + n = perm.size + af = perm.array_form + current_len = 0 + total_len = 0 + used = set() + for i in range(n//2): + if i not in used and i < n//2 - total_len: + current_len = 1 + used.add(i) + j = i + while af[j] != i: + current_len += 1 + j = af[j] + used.add(j) + total_len += current_len + if current_len > n//2 and current_len < n - 2 and isprime(current_len): + return True + return False + + +def _distribute_gens_by_base(base, gens): + r""" + Distribute the group elements ``gens`` by membership in basic stabilizers. + + Explanation + =========== + + Notice that for a base `(b_1, b_2, \dots, b_k)`, the basic stabilizers + are defined as `G^{(i)} = G_{b_1, \dots, b_{i-1}}` for + `i \in\{1, 2, \dots, k\}`. + + Parameters + ========== + + base : a sequence of points in `\{0, 1, \dots, n-1\}` + gens : a list of elements of a permutation group of degree `n`. + + Returns + ======= + list + List of length `k`, where `k` is the length of *base*. The `i`-th entry + contains those elements in *gens* which fix the first `i` elements of + *base* (so that the `0`-th entry is equal to *gens* itself). If no + element fixes the first `i` elements of *base*, the `i`-th element is + set to a list containing the identity element. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.util import _distribute_gens_by_base + >>> D = DihedralGroup(3) + >>> D.schreier_sims() + >>> D.strong_gens + [(0 1 2), (0 2), (1 2)] + >>> D.base + [0, 1] + >>> _distribute_gens_by_base(D.base, D.strong_gens) + [[(0 1 2), (0 2), (1 2)], + [(1 2)]] + + See Also + ======== + + _strong_gens_from_distr, _orbits_transversals_from_bsgs, + _handle_precomputed_bsgs + + """ + base_len = len(base) + degree = gens[0].size + stabs = [[] for _ in range(base_len)] + max_stab_index = 0 + for gen in gens: + j = 0 + while j < base_len - 1 and gen._array_form[base[j]] == base[j]: + j += 1 + if j > max_stab_index: + max_stab_index = j + for k in range(j + 1): + stabs[k].append(gen) + for i in range(max_stab_index + 1, base_len): + stabs[i].append(_af_new(list(range(degree)))) + return stabs + + +def _handle_precomputed_bsgs(base, strong_gens, transversals=None, + basic_orbits=None, strong_gens_distr=None): + """ + Calculate BSGS-related structures from those present. + + Explanation + =========== + + The base and strong generating set must be provided; if any of the + transversals, basic orbits or distributed strong generators are not + provided, they will be calculated from the base and strong generating set. + + Parameters + ========== + + base : the base + strong_gens : the strong generators + transversals : basic transversals + basic_orbits : basic orbits + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Returns + ======= + + (transversals, basic_orbits, strong_gens_distr) + where *transversals* are the basic transversals, *basic_orbits* are the + basic orbits, and *strong_gens_distr* are the strong generators distributed + by membership in basic stabilizers. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.util import _handle_precomputed_bsgs + >>> D = DihedralGroup(3) + >>> D.schreier_sims() + >>> _handle_precomputed_bsgs(D.base, D.strong_gens, + ... basic_orbits=D.basic_orbits) + ([{0: (2), 1: (0 1 2), 2: (0 2)}, {1: (2), 2: (1 2)}], [[0, 1, 2], [1, 2]], [[(0 1 2), (0 2), (1 2)], [(1 2)]]) + + See Also + ======== + + _orbits_transversals_from_bsgs, _distribute_gens_by_base + + """ + if strong_gens_distr is None: + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + if transversals is None: + if basic_orbits is None: + basic_orbits, transversals = \ + _orbits_transversals_from_bsgs(base, strong_gens_distr) + else: + transversals = \ + _orbits_transversals_from_bsgs(base, strong_gens_distr, + transversals_only=True) + else: + if basic_orbits is None: + base_len = len(base) + basic_orbits = [None]*base_len + for i in range(base_len): + basic_orbits[i] = list(transversals[i].keys()) + return transversals, basic_orbits, strong_gens_distr + + +def _orbits_transversals_from_bsgs(base, strong_gens_distr, + transversals_only=False, slp=False): + """ + Compute basic orbits and transversals from a base and strong generating set. + + Explanation + =========== + + The generators are provided as distributed across the basic stabilizers. + If the optional argument ``transversals_only`` is set to True, only the + transversals are returned. + + Parameters + ========== + + base : The base. + strong_gens_distr : Strong generators distributed by membership in basic stabilizers. + transversals_only : bool, default: False + A flag switching between returning only the + transversals and both orbits and transversals. + slp : bool, default: False + If ``True``, return a list of dictionaries containing the + generator presentations of the elements of the transversals, + i.e. the list of indices of generators from ``strong_gens_distr[i]`` + such that their product is the relevant transversal element. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _distribute_gens_by_base + >>> S = SymmetricGroup(3) + >>> S.schreier_sims() + >>> strong_gens_distr = _distribute_gens_by_base(S.base, S.strong_gens) + >>> (S.base, strong_gens_distr) + ([0, 1], [[(0 1 2), (2)(0 1), (1 2)], [(1 2)]]) + + See Also + ======== + + _distribute_gens_by_base, _handle_precomputed_bsgs + + """ + from sympy.combinatorics.perm_groups import _orbit_transversal + base_len = len(base) + degree = strong_gens_distr[0][0].size + transversals = [None]*base_len + slps = [None]*base_len + if transversals_only is False: + basic_orbits = [None]*base_len + for i in range(base_len): + transversals[i], slps[i] = _orbit_transversal(degree, strong_gens_distr[i], + base[i], pairs=True, slp=True) + transversals[i] = dict(transversals[i]) + if transversals_only is False: + basic_orbits[i] = list(transversals[i].keys()) + if transversals_only: + return transversals + else: + if not slp: + return basic_orbits, transversals + return basic_orbits, transversals, slps + + +def _remove_gens(base, strong_gens, basic_orbits=None, strong_gens_distr=None): + """ + Remove redundant generators from a strong generating set. + + Parameters + ========== + + base : a base + strong_gens : a strong generating set relative to *base* + basic_orbits : basic orbits + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Returns + ======= + + A strong generating set with respect to ``base`` which is a subset of + ``strong_gens``. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _remove_gens + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> S = SymmetricGroup(15) + >>> base, strong_gens = S.schreier_sims_incremental() + >>> new_gens = _remove_gens(base, strong_gens) + >>> len(new_gens) + 14 + >>> _verify_bsgs(S, base, new_gens) + True + + Notes + ===== + + This procedure is outlined in [1],p.95. + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of computational group theory" + + """ + from sympy.combinatorics.perm_groups import _orbit + base_len = len(base) + degree = strong_gens[0].size + if strong_gens_distr is None: + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + if basic_orbits is None: + basic_orbits = [] + for i in range(base_len): + basic_orbit = _orbit(degree, strong_gens_distr[i], base[i]) + basic_orbits.append(basic_orbit) + strong_gens_distr.append([]) + res = strong_gens[:] + for i in range(base_len - 1, -1, -1): + gens_copy = strong_gens_distr[i][:] + for gen in strong_gens_distr[i]: + if gen not in strong_gens_distr[i + 1]: + temp_gens = gens_copy[:] + temp_gens.remove(gen) + if temp_gens == []: + continue + temp_orbit = _orbit(degree, temp_gens, base[i]) + if temp_orbit == basic_orbits[i]: + gens_copy.remove(gen) + res.remove(gen) + return res + + +def _strip(g, base, orbits, transversals): + """ + Attempt to decompose a permutation using a (possibly partial) BSGS + structure. + + Explanation + =========== + + This is done by treating the sequence ``base`` as an actual base, and + the orbits ``orbits`` and transversals ``transversals`` as basic orbits and + transversals relative to it. + + This process is called "sifting". A sift is unsuccessful when a certain + orbit element is not found or when after the sift the decomposition + does not end with the identity element. + + The argument ``transversals`` is a list of dictionaries that provides + transversal elements for the orbits ``orbits``. + + Parameters + ========== + + g : permutation to be decomposed + base : sequence of points + orbits : list + A list in which the ``i``-th entry is an orbit of ``base[i]`` + under some subgroup of the pointwise stabilizer of ` + `base[0], base[1], ..., base[i - 1]``. The groups themselves are implicit + in this function since the only information we need is encoded in the orbits + and transversals + transversals : list + A list of orbit transversals associated with the orbits *orbits*. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, SymmetricGroup + >>> from sympy.combinatorics.util import _strip + >>> S = SymmetricGroup(5) + >>> S.schreier_sims() + >>> g = Permutation([0, 2, 3, 1, 4]) + >>> _strip(g, S.base, S.basic_orbits, S.basic_transversals) + ((4), 5) + + Notes + ===== + + The algorithm is described in [1],pp.89-90. The reason for returning + both the current state of the element being decomposed and the level + at which the sifting ends is that they provide important information for + the randomized version of the Schreier-Sims algorithm. + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E."Handbook of computational group theory" + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.schreier_sims + sympy.combinatorics.perm_groups.PermutationGroup.schreier_sims_random + + """ + h = g._array_form + base_len = len(base) + for i in range(base_len): + beta = h[base[i]] + if beta == base[i]: + continue + if beta not in orbits[i]: + return _af_new(h), i + 1 + u = transversals[i][beta]._array_form + h = _af_rmul(_af_invert(u), h) + return _af_new(h), base_len + 1 + + +def _strip_af(h, base, orbits, transversals, j, slp=[], slps={}): + """ + optimized _strip, with h, transversals and result in array form + if the stripped elements is the identity, it returns False, base_len + 1 + + j h[base[i]] == base[i] for i <= j + + """ + base_len = len(base) + for i in range(j+1, base_len): + beta = h[base[i]] + if beta == base[i]: + continue + if beta not in orbits[i]: + if not slp: + return h, i + 1 + return h, i + 1, slp + u = transversals[i][beta] + if h == u: + if not slp: + return False, base_len + 1 + return False, base_len + 1, slp + h = _af_rmul(_af_invert(u), h) + if slp: + u_slp = slps[i][beta][:] + u_slp.reverse() + u_slp = [(i, (g,)) for g in u_slp] + slp = u_slp + slp + if not slp: + return h, base_len + 1 + return h, base_len + 1, slp + + +def _strong_gens_from_distr(strong_gens_distr): + """ + Retrieve strong generating set from generators of basic stabilizers. + + This is just the union of the generators of the first and second basic + stabilizers. + + Parameters + ========== + + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import (_strong_gens_from_distr, + ... _distribute_gens_by_base) + >>> S = SymmetricGroup(3) + >>> S.schreier_sims() + >>> S.strong_gens + [(0 1 2), (2)(0 1), (1 2)] + >>> strong_gens_distr = _distribute_gens_by_base(S.base, S.strong_gens) + >>> _strong_gens_from_distr(strong_gens_distr) + [(0 1 2), (2)(0 1), (1 2)] + + See Also + ======== + + _distribute_gens_by_base + + """ + if len(strong_gens_distr) == 1: + return strong_gens_distr[0][:] + else: + result = strong_gens_distr[0] + for gen in strong_gens_distr[1]: + if gen not in result: + result.append(gen) + return result diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..4c03c9fc11479bb6d93a3bff3dfd0992ef994a19 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/__init__.py @@ -0,0 +1,103 @@ +"""Core module. Provides the basic operations needed in sympy. +""" + +from .sympify import sympify, SympifyError +from .cache import cacheit +from .assumptions import assumptions, check_assumptions, failing_assumptions, common_assumptions +from .basic import Basic, Atom +from .singleton import S +from .expr import Expr, AtomicExpr, UnevaluatedExpr +from .symbol import Symbol, Wild, Dummy, symbols, var +from .numbers import Number, Float, Rational, Integer, NumberSymbol, \ + RealNumber, igcd, ilcm, seterr, E, I, nan, oo, pi, zoo, \ + AlgebraicNumber, comp, mod_inverse +from .power import Pow +from .intfunc import integer_nthroot, integer_log, num_digits, trailing +from .mul import Mul, prod +from .add import Add +from .mod import Mod +from .relational import ( Rel, Eq, Ne, Lt, Le, Gt, Ge, + Equality, GreaterThan, LessThan, Unequality, StrictGreaterThan, + StrictLessThan ) +from .multidimensional import vectorize +from .function import Lambda, WildFunction, Derivative, diff, FunctionClass, \ + Function, Subs, expand, PoleError, count_ops, \ + expand_mul, expand_log, expand_func, \ + expand_trig, expand_complex, expand_multinomial, nfloat, \ + expand_power_base, expand_power_exp, arity +from .evalf import PrecisionExhausted, N +from .containers import Tuple, Dict +from .exprtools import gcd_terms, factor_terms, factor_nc +from .parameters import evaluate +from .kind import UndefinedKind, NumberKind, BooleanKind +from .traversal import preorder_traversal, bottom_up, use, postorder_traversal +from .sorting import default_sort_key, ordered + +# expose singletons +Catalan = S.Catalan +EulerGamma = S.EulerGamma +GoldenRatio = S.GoldenRatio +TribonacciConstant = S.TribonacciConstant + +__all__ = [ + 'sympify', 'SympifyError', + + 'cacheit', + + 'assumptions', 'check_assumptions', 'failing_assumptions', + 'common_assumptions', + + 'Basic', 'Atom', + + 'S', + + 'Expr', 'AtomicExpr', 'UnevaluatedExpr', + + 'Symbol', 'Wild', 'Dummy', 'symbols', 'var', + + 'Number', 'Float', 'Rational', 'Integer', 'NumberSymbol', 'RealNumber', + 'igcd', 'ilcm', 'seterr', 'E', 'I', 'nan', 'oo', 'pi', 'zoo', + 'AlgebraicNumber', 'comp', 'mod_inverse', + + 'Pow', + + 'integer_nthroot', 'integer_log', 'num_digits', 'trailing', + + 'Mul', 'prod', + + 'Add', + + 'Mod', + + 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', 'Equality', 'GreaterThan', + 'LessThan', 'Unequality', 'StrictGreaterThan', 'StrictLessThan', + + 'vectorize', + + 'Lambda', 'WildFunction', 'Derivative', 'diff', 'FunctionClass', + 'Function', 'Subs', 'expand', 'PoleError', 'count_ops', 'expand_mul', + 'expand_log', 'expand_func', 'expand_trig', 'expand_complex', + 'expand_multinomial', 'nfloat', 'expand_power_base', 'expand_power_exp', + 'arity', + + 'PrecisionExhausted', 'N', + + 'evalf', # The module? + + 'Tuple', 'Dict', + + 'gcd_terms', 'factor_terms', 'factor_nc', + + 'evaluate', + + 'Catalan', + 'EulerGamma', + 'GoldenRatio', + 'TribonacciConstant', + + 'UndefinedKind', 'NumberKind', 'BooleanKind', + + 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Natively Python uses ``repr()`` + even if ``str()`` was explicitly requested. Mix in this trait into + a class to get proper default printing. + + This also adds support for LaTeX printing in jupyter notebooks. + """ + + # Since this class is used as a mixin we set empty slots. That means that + # instances of any subclasses that use slots will not need to have a + # __dict__. + __slots__ = () + + # Note, we always use the default ordering (lex) in __str__ and __repr__, + # regardless of the global setting. See issue 5487. + def __str__(self): + from sympy.printing.str import sstr + return sstr(self, order=None) + + __repr__ = __str__ + + def _repr_disabled(self): + """ + No-op repr function used to disable jupyter display hooks. + + When :func:`sympy.init_printing` is used to disable certain display + formats, this function is copied into the appropriate ``_repr_*_`` + attributes. + + While we could just set the attributes to `None``, doing it this way + allows derived classes to call `super()`. + """ + return None + + # We don't implement _repr_png_ here because it would add a large amount of + # data to any notebook containing SymPy expressions, without adding + # anything useful to the notebook. It can still enabled manually, e.g., + # for the qtconsole, with init_printing(). + _repr_png_ = _repr_disabled + + _repr_svg_ = _repr_disabled + + def _repr_latex_(self): + """ + IPython/Jupyter LaTeX printing + + To change the behavior of this (e.g., pass in some settings to LaTeX), + use init_printing(). init_printing() will also enable LaTeX printing + for built in numeric types like ints and container types that contain + SymPy objects, like lists and dictionaries of expressions. + """ + from sympy.printing.latex import latex + s = latex(self, mode='plain') + return "$\\displaystyle %s$" % s diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/add.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/add.py new file mode 100644 index 0000000000000000000000000000000000000000..2d280f3286c34cd0dea14bf61194ed03ee6bf6ae --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/add.py @@ -0,0 +1,1280 @@ +from __future__ import annotations + +from typing import TYPE_CHECKING, ClassVar +from collections import defaultdict +from functools import reduce +from operator import attrgetter +from .basic import _args_sortkey +from .parameters import global_parameters +from .logic import _fuzzy_group, fuzzy_or, fuzzy_not +from .singleton import S +from .operations import AssocOp, AssocOpDispatcher +from .cache import cacheit +from .intfunc import ilcm, igcd +from .expr import Expr +from .kind import UndefinedKind +from sympy.utilities.iterables import is_sequence, sift + + +if TYPE_CHECKING: + from sympy.core.numbers import Number + from sympy.series.order import Order + + +def _could_extract_minus_sign(expr): + # assume expr is Add-like + # We choose the one with less arguments with minus signs + negative_args = sum(1 for i in expr.args + if i.could_extract_minus_sign()) + positive_args = len(expr.args) - negative_args + if positive_args > negative_args: + return False + elif positive_args < negative_args: + return True + # choose based on .sort_key() to prefer + # x - 1 instead of 1 - x and + # 3 - sqrt(2) instead of -3 + sqrt(2) + return bool(expr.sort_key() < (-expr).sort_key()) + + +def _addsort(args): + # in-place sorting of args + args.sort(key=_args_sortkey) + + +def _unevaluated_Add(*args): + """Return a well-formed unevaluated Add: Numbers are collected and + put in slot 0 and args are sorted. Use this when args have changed + but you still want to return an unevaluated Add. + + Examples + ======== + + >>> from sympy.core.add import _unevaluated_Add as uAdd + >>> from sympy import S, Add + >>> from sympy.abc import x, y + >>> a = uAdd(*[S(1.0), x, S(2)]) + >>> a.args[0] + 3.00000000000000 + >>> a.args[1] + x + + Beyond the Number being in slot 0, there is no other assurance of + order for the arguments since they are hash sorted. So, for testing + purposes, output produced by this in some other function can only + be tested against the output of this function or as one of several + options: + + >>> opts = (Add(x, y, evaluate=False), Add(y, x, evaluate=False)) + >>> a = uAdd(x, y) + >>> assert a in opts and a == uAdd(x, y) + >>> uAdd(x + 1, x + 2) + x + x + 3 + """ + args = list(args) + newargs = [] + co = S.Zero + while args: + a = args.pop() + if a.is_Add: + # this will keep nesting from building up + # so that x + (x + 1) -> x + x + 1 (3 args) + args.extend(a.args) + elif a.is_Number: + co += a + else: + newargs.append(a) + _addsort(newargs) + if co: + newargs.insert(0, co) + return Add._from_args(newargs) + + +class Add(Expr, AssocOp): + """ + Expression representing addition operation for algebraic group. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Every argument of ``Add()`` must be ``Expr``. Infix operator ``+`` + on most scalar objects in SymPy calls this class. + + Another use of ``Add()`` is to represent the structure of abstract + addition so that its arguments can be substituted to return different + class. Refer to examples section for this. + + ``Add()`` evaluates the argument unless ``evaluate=False`` is passed. + The evaluation logic includes: + + 1. Flattening + ``Add(x, Add(y, z))`` -> ``Add(x, y, z)`` + + 2. Identity removing + ``Add(x, 0, y)`` -> ``Add(x, y)`` + + 3. Coefficient collecting by ``.as_coeff_Mul()`` + ``Add(x, 2*x)`` -> ``Mul(3, x)`` + + 4. Term sorting + ``Add(y, x, 2)`` -> ``Add(2, x, y)`` + + If no argument is passed, identity element 0 is returned. If single + element is passed, that element is returned. + + Note that ``Add(*args)`` is more efficient than ``sum(args)`` because + it flattens the arguments. ``sum(a, b, c, ...)`` recursively adds the + arguments as ``a + (b + (c + ...))``, which has quadratic complexity. + On the other hand, ``Add(a, b, c, d)`` does not assume nested + structure, making the complexity linear. + + Since addition is group operation, every argument should have the + same :obj:`sympy.core.kind.Kind()`. + + Examples + ======== + + >>> from sympy import Add, I + >>> from sympy.abc import x, y + >>> Add(x, 1) + x + 1 + >>> Add(x, x) + 2*x + >>> 2*x**2 + 3*x + I*y + 2*y + 2*x/5 + 1.0*y + 1 + 2*x**2 + 17*x/5 + 3.0*y + I*y + 1 + + If ``evaluate=False`` is passed, result is not evaluated. + + >>> Add(1, 2, evaluate=False) + 1 + 2 + >>> Add(x, x, evaluate=False) + x + x + + ``Add()`` also represents the general structure of addition operation. + + >>> from sympy import MatrixSymbol + >>> A,B = MatrixSymbol('A', 2,2), MatrixSymbol('B', 2,2) + >>> expr = Add(x,y).subs({x:A, y:B}) + >>> expr + A + B + >>> type(expr) + + + Note that the printers do not display in args order. + + >>> Add(x, 1) + x + 1 + >>> Add(x, 1).args + (1, x) + + See Also + ======== + + MatAdd + + """ + + __slots__ = () + + is_Add = True + + _args_type = Expr + + identity: ClassVar[Expr] + + if TYPE_CHECKING: + + def __new__(cls, *args: Expr | complex, evaluate: bool=True) -> Expr: # type: ignore + ... + + @property + def args(self) -> tuple[Expr, ...]: + ... + + @classmethod + def flatten(cls, seq: list[Expr]) -> tuple[list[Expr], list[Expr], None]: + """ + Takes the sequence "seq" of nested Adds and returns a flatten list. + + Returns: (commutative_part, noncommutative_part, order_symbols) + + Applies associativity, all terms are commutable with respect to + addition. + + NB: the removal of 0 is already handled by AssocOp.__new__ + + See Also + ======== + + sympy.core.mul.Mul.flatten + + """ + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.matrices.expressions import MatrixExpr + from sympy.tensor.tensor import TensExpr, TensAdd + rv = None + if len(seq) == 2: + a, b = seq + if b.is_Rational: + a, b = b, a + if a.is_Rational: + if b.is_Mul: + rv = [a, b], [], None + if rv: + if all(s.is_commutative for s in rv[0]): + return rv + return [], rv[0], None + + # term -> coeff + # e.g. x**2 -> 5 for ... + 5*x**2 + ... + terms: dict[Expr, Number] = {} + + # coefficient (Number or zoo) to always be in slot 0 + # e.g. 3 + ... + coeff: Expr = S.Zero + + order_factors: list[Order] = [] + + extra: list[MatrixExpr] = [] + + for o in seq: + + # O(x) + if o.is_Order: + if o.expr.is_zero: # type: ignore + continue + if any(o1.contains(o) for o1 in order_factors): + continue + order_factors = [o1 for o1 in order_factors if not o.contains(o1)] # type: ignore + order_factors = [o] + order_factors # type: ignore + continue + + # 3 or NaN + elif o.is_Number: + if (o is S.NaN or coeff is S.ComplexInfinity and + o.is_finite is False) and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + if coeff.is_Number or isinstance(coeff, AccumBounds): + coeff += o + if coeff is S.NaN and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + continue + + elif isinstance(o, AccumBounds): + coeff = o.__add__(coeff) + continue + + elif isinstance(o, MatrixExpr): + # can't add 0 to Matrix so make sure coeff is not 0 + extra.append(o) + continue + + elif isinstance(o, TensExpr): + coeff = TensAdd(o, coeff).doit(deep=False) + continue + + elif o is S.ComplexInfinity: + if coeff.is_finite is False and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + coeff = S.ComplexInfinity + continue + + # Add([...]) + elif o.is_Add: + # NB: here we assume Add is always commutative + o_args: tuple[Expr, ...] = o.args # type: ignore + seq.extend(o_args) # TODO zerocopy? + continue + + # Mul([...]) + elif o.is_Mul: + c, s = o.as_coeff_Mul() + + # check for unevaluated Pow, e.g. 2**3 or 2**(-1/2) + elif o.is_Pow: + b, e = o.as_base_exp() + if b.is_Number and (e.is_Integer or + (e.is_Rational and e.is_negative)): + seq.append(b**e) + continue + c, s = S.One, o + + else: + # everything else + c = S.One + s = o + + # now we have: + # o = c*s, where + # + # c is a Number + # s is an expression with number factor extracted + # let's collect terms with the same s, so e.g. + # 2*x**2 + 3*x**2 -> 5*x**2 + if s in terms: + terms[s] += c + if terms[s] is S.NaN and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + else: + terms[s] = c + + # now let's construct new args: + # [2*x**2, x**3, 7*x**4, pi, ...] + newseq = [] + noncommutative = False + for s, c in terms.items(): + # 0*s + if c.is_zero: + continue + # 1*s + elif c is S.One: + newseq.append(s) + # c*s + else: + if s.is_Mul: + # Mul, already keeps its arguments in perfect order. + # so we can simply put c in slot0 and go the fast way. + # + # XXX: This breaks VectorMul unless it overrides + # _new_rawargs + cs = s._new_rawargs(*((c,) + s.args)) # type: ignore + newseq.append(cs) + elif s.is_Add: + # we just re-create the unevaluated Mul + newseq.append(Mul(c, s, evaluate=False)) + else: + # alternatively we have to call all Mul's machinery (slow) + newseq.append(Mul(c, s)) + + noncommutative = noncommutative or not s.is_commutative + + # oo, -oo + if coeff is S.Infinity: + newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)] + + elif coeff is S.NegativeInfinity: + newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)] + + if coeff is S.ComplexInfinity: + # zoo might be + # infinite_real + finite_im + # finite_real + infinite_im + # infinite_real + infinite_im + # addition of a finite real or imaginary number won't be able to + # change the zoo nature; adding an infinite qualtity would result + # in a NaN condition if it had sign opposite of the infinite + # portion of zoo, e.g., infinite_real - infinite_real. + newseq = [c for c in newseq if not (c.is_finite and + c.is_extended_real is not None)] + + # process O(x) + if order_factors: + newseq2 = [] + for t in newseq: + # x + O(x) -> O(x) + if not any(o.contains(t) for o in order_factors): + newseq2.append(t) + newseq = newseq2 + order_factors # type: ignore + # 1 + O(1) -> O(1) + for o in order_factors: + if o.contains(coeff): + coeff = S.Zero + break + + # order args canonically + _addsort(newseq) + + # current code expects coeff to be first + if coeff is not S.Zero: + newseq.insert(0, coeff) + + if extra: + newseq += extra + noncommutative = True + + # we are done + if noncommutative: + return [], newseq, None + else: + return newseq, [], None + + @classmethod + def class_key(cls): + return 3, 1, cls.__name__ + + @property + def kind(self): + k = attrgetter('kind') + kinds = map(k, self.args) + kinds = frozenset(kinds) + if len(kinds) != 1: + # Since addition is group operator, kind must be same. + # We know that this is unexpected signature, so return this. + result = UndefinedKind + else: + result, = kinds + return result + + def could_extract_minus_sign(self): + return _could_extract_minus_sign(self) + + @cacheit + def as_coeff_add(self, *deps): + """ + Returns a tuple (coeff, args) where self is treated as an Add and coeff + is the Number term and args is a tuple of all other terms. + + Examples + ======== + + >>> from sympy.abc import x + >>> (7 + 3*x).as_coeff_add() + (7, (3*x,)) + >>> (7*x).as_coeff_add() + (0, (7*x,)) + """ + if deps: + l1, l2 = sift(self.args, lambda x: x.has_free(*deps), binary=True) + return self._new_rawargs(*l2), tuple(l1) + coeff, notrat = self.args[0].as_coeff_add() + if coeff is not S.Zero: + return coeff, notrat + self.args[1:] + return S.Zero, self.args + + def as_coeff_Add(self, rational=False, deps=None) -> tuple[Number, Expr]: + """ + Efficiently extract the coefficient of a summation. + """ + coeff, args = self.args[0], self.args[1:] + + if coeff.is_Number and not rational or coeff.is_Rational: + return coeff, self._new_rawargs(*args) # type: ignore + return S.Zero, self + + # Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we + # let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See + # issue 5524. + + def _eval_power(self, expt): + from .evalf import pure_complex + from .relational import is_eq + if len(self.args) == 2 and any(_.is_infinite for _ in self.args): + if expt.is_zero is False and is_eq(expt, S.One) is False: + # looking for literal a + I*b + a, b = self.args + if a.coeff(S.ImaginaryUnit): + a, b = b, a + ico = b.coeff(S.ImaginaryUnit) + if ico and ico.is_extended_real and a.is_extended_real: + if expt.is_extended_negative: + return S.Zero + if expt.is_extended_positive: + return S.ComplexInfinity + return + if expt.is_Rational and self.is_number: + ri = pure_complex(self) + if ri: + r, i = ri + if expt.q == 2: + from sympy.functions.elementary.miscellaneous import sqrt + D = sqrt(r**2 + i**2) + if D.is_Rational: + from .exprtools import factor_terms + from sympy.functions.elementary.complexes import sign + from .function import expand_multinomial + # (r, i, D) is a Pythagorean triple + root = sqrt(factor_terms((D - r)/2))**expt.p + return root*expand_multinomial(( + # principle value + (D + r)/abs(i) + sign(i)*S.ImaginaryUnit)**expt.p) + elif expt == -1: + return _unevaluated_Mul( + r - i*S.ImaginaryUnit, + 1/(r**2 + i**2)) + + @cacheit + def _eval_derivative(self, s): + return self.func(*[a.diff(s) for a in self.args]) + + def _eval_nseries(self, x, n, logx, cdir=0): + terms = [t.nseries(x, n=n, logx=logx, cdir=cdir) for t in self.args] + return self.func(*terms) + + def _matches_simple(self, expr, repl_dict): + # handle (w+3).matches('x+5') -> {w: x+2} + coeff, terms = self.as_coeff_add() + if len(terms) == 1: + return terms[0].matches(expr - coeff, repl_dict) + return + + def matches(self, expr, repl_dict=None, old=False): + return self._matches_commutative(expr, repl_dict, old) + + @staticmethod + def _combine_inverse(lhs, rhs): + """ + Returns lhs - rhs, but treats oo like a symbol so oo - oo + returns 0, instead of a nan. + """ + from sympy.simplify.simplify import signsimp + inf = (S.Infinity, S.NegativeInfinity) + if lhs.has(*inf) or rhs.has(*inf): + from .symbol import Dummy + oo = Dummy('oo') + reps = { + S.Infinity: oo, + S.NegativeInfinity: -oo} + ireps = {v: k for k, v in reps.items()} + eq = lhs.xreplace(reps) - rhs.xreplace(reps) + if eq.has(oo): + eq = eq.replace( + lambda x: x.is_Pow and x.base is oo, + lambda x: x.base) + rv = eq.xreplace(ireps) + else: + rv = lhs - rhs + srv = signsimp(rv) + return srv if srv.is_Number else rv + + @cacheit + def as_two_terms(self): + """Return head and tail of self. + + This is the most efficient way to get the head and tail of an + expression. + + - if you want only the head, use self.args[0]; + - if you want to process the arguments of the tail then use + self.as_coef_add() which gives the head and a tuple containing + the arguments of the tail when treated as an Add. + - if you want the coefficient when self is treated as a Mul + then use self.as_coeff_mul()[0] + + >>> from sympy.abc import x, y + >>> (3*x - 2*y + 5).as_two_terms() + (5, 3*x - 2*y) + """ + return self.args[0], self._new_rawargs(*self.args[1:]) + + def as_numer_denom(self) -> tuple[Expr, Expr]: + """ + Decomposes an expression to its numerator part and its + denominator part. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> (x*y/z).as_numer_denom() + (x*y, z) + >>> (x*(y + 1)/y**7).as_numer_denom() + (x*(y + 1), y**7) + + See Also + ======== + + sympy.core.expr.Expr.as_numer_denom + """ + # clear rational denominator + content, expr = self.primitive() + if not isinstance(expr, Add): + return Mul(content, expr, evaluate=False).as_numer_denom() + ncon, dcon = content.as_numer_denom() + + # collect numerators and denominators of the terms + nd = defaultdict(list) + for f in expr.args: + ni, di = f.as_numer_denom() + nd[di].append(ni) + + # check for quick exit + if len(nd) == 1: + d, n = nd.popitem() + return self.func( + *[_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d) + + # sum up the terms having a common denominator + nd2 = {d: self.func(*n) if len(n) > 1 else n[0] for d, n in nd.items()} + + # assemble single numerator and denominator + denoms, numers = [list(i) for i in zip(*iter(nd2.items()))] + n, d = self.func(*[Mul(*(denoms[:i] + [numers[i]] + denoms[i + 1:])) + for i in range(len(numers))]), Mul(*denoms) + + return _keep_coeff(ncon, n), _keep_coeff(dcon, d) + + def _eval_is_polynomial(self, syms): + return all(term._eval_is_polynomial(syms) for term in self.args) + + def _eval_is_rational_function(self, syms): + return all(term._eval_is_rational_function(syms) for term in self.args) + + def _eval_is_meromorphic(self, x, a): + return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args), + quick_exit=True) + + def _eval_is_algebraic_expr(self, syms): + return all(term._eval_is_algebraic_expr(syms) for term in self.args) + + # assumption methods + _eval_is_real = lambda self: _fuzzy_group( + (a.is_real for a in self.args), quick_exit=True) + _eval_is_extended_real = lambda self: _fuzzy_group( + (a.is_extended_real for a in self.args), quick_exit=True) + _eval_is_complex = lambda self: _fuzzy_group( + (a.is_complex for a in self.args), quick_exit=True) + _eval_is_antihermitian = lambda self: _fuzzy_group( + (a.is_antihermitian for a in self.args), quick_exit=True) + _eval_is_finite = lambda self: _fuzzy_group( + (a.is_finite for a in self.args), quick_exit=True) + _eval_is_hermitian = lambda self: _fuzzy_group( + (a.is_hermitian for a in self.args), quick_exit=True) + _eval_is_integer = lambda self: _fuzzy_group( + (a.is_integer for a in self.args), quick_exit=True) + _eval_is_rational = lambda self: _fuzzy_group( + (a.is_rational for a in self.args), quick_exit=True) + _eval_is_algebraic = lambda self: _fuzzy_group( + (a.is_algebraic for a in self.args), quick_exit=True) + _eval_is_commutative = lambda self: _fuzzy_group( + a.is_commutative for a in self.args) + + def _eval_is_infinite(self): + sawinf = False + for a in self.args: + ainf = a.is_infinite + if ainf is None: + return None + elif ainf is True: + # infinite+infinite might not be infinite + if sawinf is True: + return None + sawinf = True + return sawinf + + def _eval_is_imaginary(self): + nz = [] + im_I = [] + for a in self.args: + if a.is_extended_real: + if a.is_zero: + pass + elif a.is_zero is False: + nz.append(a) + else: + return + elif a.is_imaginary: + im_I.append(a*S.ImaginaryUnit) + elif a.is_Mul and S.ImaginaryUnit in a.args: + coeff, ai = a.as_coeff_mul(S.ImaginaryUnit) + if ai == (S.ImaginaryUnit,) and coeff.is_extended_real: + im_I.append(-coeff) + else: + return + else: + return + b = self.func(*nz) + if b != self: + if b.is_zero: + return fuzzy_not(self.func(*im_I).is_zero) + elif b.is_zero is False: + return False + + def _eval_is_zero(self): + if self.is_commutative is False: + # issue 10528: there is no way to know if a nc symbol + # is zero or not + return + nz = [] + z = 0 + im_or_z = False + im = 0 + for a in self.args: + if a.is_extended_real: + if a.is_zero: + z += 1 + elif a.is_zero is False: + nz.append(a) + else: + return + elif a.is_imaginary: + im += 1 + elif a.is_Mul and S.ImaginaryUnit in a.args: + coeff, ai = a.as_coeff_mul(S.ImaginaryUnit) + if ai == (S.ImaginaryUnit,) and coeff.is_extended_real: + im_or_z = True + else: + return + else: + return + if z == len(self.args): + return True + if len(nz) in [0, len(self.args)]: + return None + b = self.func(*nz) + if b.is_zero: + if not im_or_z: + if im == 0: + return True + elif im == 1: + return False + if b.is_zero is False: + return False + + def _eval_is_odd(self): + l = [f for f in self.args if not (f.is_even is True)] + if not l: + return False + if l[0].is_odd: + return self._new_rawargs(*l[1:]).is_even + + def _eval_is_irrational(self): + for t in self.args: + a = t.is_irrational + if a: + others = list(self.args) + others.remove(t) + if all(x.is_rational is True for x in others): + return True + return None + if a is None: + return + return False + + def _all_nonneg_or_nonppos(self): + nn = np = 0 + for a in self.args: + if a.is_nonnegative: + if np: + return False + nn = 1 + elif a.is_nonpositive: + if nn: + return False + np = 1 + else: + break + else: + return True + + def _eval_is_extended_positive(self): + if self.is_number: + return super()._eval_is_extended_positive() + c, a = self.as_coeff_Add() + if not c.is_zero: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_positive and a.is_extended_nonnegative: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_positive: + return True + pos = nonneg = nonpos = unknown_sign = False + saw_INF = set() + args = [a for a in self.args if not a.is_zero] + if not args: + return False + for a in args: + ispos = a.is_extended_positive + infinite = a.is_infinite + if infinite: + saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative))) + if True in saw_INF and False in saw_INF: + return + if ispos: + pos = True + continue + elif a.is_extended_nonnegative: + nonneg = True + continue + elif a.is_extended_nonpositive: + nonpos = True + continue + + if infinite is None: + return + unknown_sign = True + + if saw_INF: + if len(saw_INF) > 1: + return + return saw_INF.pop() + elif unknown_sign: + return + elif not nonpos and not nonneg and pos: + return True + elif not nonpos and pos: + return True + elif not pos and not nonneg: + return False + + def _eval_is_extended_nonnegative(self): + if not self.is_number: + c, a = self.as_coeff_Add() + if not c.is_zero and a.is_extended_nonnegative: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_nonnegative: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_nonnegative: + return True + + def _eval_is_extended_nonpositive(self): + if not self.is_number: + c, a = self.as_coeff_Add() + if not c.is_zero and a.is_extended_nonpositive: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_nonpositive: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_nonpositive: + return True + + def _eval_is_extended_negative(self): + if self.is_number: + return super()._eval_is_extended_negative() + c, a = self.as_coeff_Add() + if not c.is_zero: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_negative and a.is_extended_nonpositive: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_negative: + return True + neg = nonpos = nonneg = unknown_sign = False + saw_INF = set() + args = [a for a in self.args if not a.is_zero] + if not args: + return False + for a in args: + isneg = a.is_extended_negative + infinite = a.is_infinite + if infinite: + saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive))) + if True in saw_INF and False in saw_INF: + return + if isneg: + neg = True + continue + elif a.is_extended_nonpositive: + nonpos = True + continue + elif a.is_extended_nonnegative: + nonneg = True + continue + + if infinite is None: + return + unknown_sign = True + + if saw_INF: + if len(saw_INF) > 1: + return + return saw_INF.pop() + elif unknown_sign: + return + elif not nonneg and not nonpos and neg: + return True + elif not nonneg and neg: + return True + elif not neg and not nonpos: + return False + + def _eval_subs(self, old, new): + if not old.is_Add: + if old is S.Infinity and -old in self.args: + # foo - oo is foo + (-oo) internally + return self.xreplace({-old: -new}) + return None + + coeff_self, terms_self = self.as_coeff_Add() + coeff_old, terms_old = old.as_coeff_Add() + + if coeff_self.is_Rational and coeff_old.is_Rational: + if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y + return self.func(new, coeff_self, -coeff_old) + if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y + return self.func(-new, coeff_self, coeff_old) + + if coeff_self.is_Rational and coeff_old.is_Rational \ + or coeff_self == coeff_old: + args_old, args_self = self.func.make_args( + terms_old), self.func.make_args(terms_self) + if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x + self_set = set(args_self) + old_set = set(args_old) + + if old_set < self_set: + ret_set = self_set - old_set + return self.func(new, coeff_self, -coeff_old, + *[s._subs(old, new) for s in ret_set]) + + args_old = self.func.make_args( + -terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d + old_set = set(args_old) + if old_set < self_set: + ret_set = self_set - old_set + return self.func(-new, coeff_self, coeff_old, + *[s._subs(old, new) for s in ret_set]) + + def removeO(self): + args = [a for a in self.args if not a.is_Order] + return self._new_rawargs(*args) + + def getO(self): + args = [a for a in self.args if a.is_Order] + if args: + return self._new_rawargs(*args) + + @cacheit + def extract_leading_order(self, symbols, point=None): + """ + Returns the leading term and its order. + + Examples + ======== + + >>> from sympy.abc import x + >>> (x + 1 + 1/x**5).extract_leading_order(x) + ((x**(-5), O(x**(-5))),) + >>> (1 + x).extract_leading_order(x) + ((1, O(1)),) + >>> (x + x**2).extract_leading_order(x) + ((x, O(x)),) + + """ + from sympy.series.order import Order + lst = [] + symbols = list(symbols if is_sequence(symbols) else [symbols]) + if not point: + point = [0]*len(symbols) + seq = [(f, Order(f, *zip(symbols, point))) for f in self.args] + for ef, of in seq: + for e, o in lst: + if o.contains(of) and o != of: + of = None + break + if of is None: + continue + new_lst = [(ef, of)] + for e, o in lst: + if of.contains(o) and o != of: + continue + new_lst.append((e, o)) + lst = new_lst + return tuple(lst) + + def as_real_imag(self, deep=True, **hints): + """ + Return a tuple representing a complex number. + + Examples + ======== + + >>> from sympy import I + >>> (7 + 9*I).as_real_imag() + (7, 9) + >>> ((1 + I)/(1 - I)).as_real_imag() + (0, 1) + >>> ((1 + 2*I)*(1 + 3*I)).as_real_imag() + (-5, 5) + """ + sargs = self.args + re_part, im_part = [], [] + for term in sargs: + re, im = term.as_real_imag(deep=deep) + re_part.append(re) + im_part.append(im) + return (self.func(*re_part), self.func(*im_part)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.core.symbol import Dummy, Symbol + from sympy.series.order import Order + from sympy.functions.elementary.exponential import log + from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold + from .function import expand_mul + + o = self.getO() + if o is None: + o = Order(0) + old = self.removeO() + + if old.has(Piecewise): + old = piecewise_fold(old) + + # This expansion is the last part of expand_log. expand_log also calls + # expand_mul with factor=True, which would be more expensive + if any(isinstance(a, log) for a in self.args): + logflags = {"deep": True, "log": True, "mul": False, "power_exp": False, + "power_base": False, "multinomial": False, "basic": False, "force": False, + "factor": False} + old = old.expand(**logflags) + expr = expand_mul(old) + + if not expr.is_Add: + return expr.as_leading_term(x, logx=logx, cdir=cdir) + + infinite = [t for t in expr.args if t.is_infinite] + + _logx = Dummy('logx') if logx is None else logx + leading_terms = [t.as_leading_term(x, logx=_logx, cdir=cdir) for t in expr.args] + + min, new_expr = Order(0), S.Zero + + try: + for term in leading_terms: + order = Order(term, x) + if not min or order not in min: + min = order + new_expr = term + elif min in order: + new_expr += term + + except TypeError: + return expr + + if logx is None: + new_expr = new_expr.subs(_logx, log(x)) + + is_zero = new_expr.is_zero + if is_zero is None: + new_expr = new_expr.trigsimp().cancel() + is_zero = new_expr.is_zero + if is_zero is True: + # simple leading term analysis gave us cancelled terms but we have to send + # back a term, so compute the leading term (via series) + try: + n0 = min.getn() + except NotImplementedError: + n0 = S.One + if n0.has(Symbol): + n0 = S.One + res = Order(1) + incr = S.One + while res.is_Order: + res = old._eval_nseries(x, n=n0+incr, logx=logx, cdir=cdir).cancel().powsimp().trigsimp() + incr *= 2 + return res.as_leading_term(x, logx=logx, cdir=cdir) + + elif new_expr is S.NaN: + return old.func._from_args(infinite) + o + + else: + return new_expr + + def _eval_adjoint(self): + return self.func(*[t.adjoint() for t in self.args]) + + def _eval_conjugate(self): + return self.func(*[t.conjugate() for t in self.args]) + + def _eval_transpose(self): + return self.func(*[t.transpose() for t in self.args]) + + def primitive(self): + """ + Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```. + + ``R`` is collected only from the leading coefficient of each term. + + Examples + ======== + + >>> from sympy.abc import x, y + + >>> (2*x + 4*y).primitive() + (2, x + 2*y) + + >>> (2*x/3 + 4*y/9).primitive() + (2/9, 3*x + 2*y) + + >>> (2*x/3 + 4.2*y).primitive() + (1/3, 2*x + 12.6*y) + + No subprocessing of term factors is performed: + + >>> ((2 + 2*x)*x + 2).primitive() + (1, x*(2*x + 2) + 2) + + Recursive processing can be done with the ``as_content_primitive()`` + method: + + >>> ((2 + 2*x)*x + 2).as_content_primitive() + (2, x*(x + 1) + 1) + + See also: primitive() function in polytools.py + + """ + + terms = [] + inf = False + for a in self.args: + c, m = a.as_coeff_Mul() + if not c.is_Rational: + c = S.One + m = a + inf = inf or m is S.ComplexInfinity + terms.append((c.p, c.q, m)) + + if not inf: + ngcd = reduce(igcd, [t[0] for t in terms], 0) + dlcm = reduce(ilcm, [t[1] for t in terms], 1) + else: + ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0) + dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1) + + if ngcd == dlcm == 1: + return S.One, self + if not inf: + for i, (p, q, term) in enumerate(terms): + terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) + else: + for i, (p, q, term) in enumerate(terms): + if q: + terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) + else: + terms[i] = _keep_coeff(Rational(p, q), term) + + # we don't need a complete re-flattening since no new terms will join + # so we just use the same sort as is used in Add.flatten. When the + # coefficient changes, the ordering of terms may change, e.g. + # (3*x, 6*y) -> (2*y, x) + # + # We do need to make sure that term[0] stays in position 0, however. + # + if terms[0].is_Number or terms[0] is S.ComplexInfinity: + c = terms.pop(0) + else: + c = None + _addsort(terms) + if c: + terms.insert(0, c) + return Rational(ngcd, dlcm), self._new_rawargs(*terms) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. If radical is True (default is False) then + common radicals will be removed and included as a factor of the + primitive expression. + + Examples + ======== + + >>> from sympy import sqrt + >>> (3 + 3*sqrt(2)).as_content_primitive() + (3, 1 + sqrt(2)) + + Radical content can also be factored out of the primitive: + + >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) + (2, sqrt(2)*(1 + 2*sqrt(5))) + + See docstring of Expr.as_content_primitive for more examples. + """ + con, prim = self.func(*[_keep_coeff(*a.as_content_primitive( + radical=radical, clear=clear)) for a in self.args]).primitive() + if not clear and not con.is_Integer and prim.is_Add: + con, d = con.as_numer_denom() + _p = prim/d + if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args): + prim = _p + else: + con /= d + if radical and prim.is_Add: + # look for common radicals that can be removed + args = prim.args + rads = [] + common_q = None + for m in args: + term_rads = defaultdict(list) + for ai in Mul.make_args(m): + if ai.is_Pow: + b, e = ai.as_base_exp() + if e.is_Rational and b.is_Integer: + term_rads[e.q].append(abs(int(b))**e.p) + if not term_rads: + break + if common_q is None: + common_q = set(term_rads.keys()) + else: + common_q = common_q & set(term_rads.keys()) + if not common_q: + break + rads.append(term_rads) + else: + # process rads + # keep only those in common_q + for r in rads: + for q in list(r.keys()): + if q not in common_q: + r.pop(q) + for q in r: + r[q] = Mul(*r[q]) + # find the gcd of bases for each q + G = [] + for q in common_q: + g = reduce(igcd, [r[q] for r in rads], 0) + if g != 1: + G.append(g**Rational(1, q)) + if G: + G = Mul(*G) + args = [ai/G for ai in args] + prim = G*prim.func(*args) + + return con, prim + + @property + def _sorted_args(self): + from .sorting import default_sort_key + return tuple(sorted(self.args, key=default_sort_key)) + + def _eval_difference_delta(self, n, step): + from sympy.series.limitseq import difference_delta as dd + return self.func(*[dd(a, n, step) for a in self.args]) + + @property + def _mpc_(self): + """ + Convert self to an mpmath mpc if possible + """ + from .numbers import Float + re_part, rest = self.as_coeff_Add() + im_part, imag_unit = rest.as_coeff_Mul() + if not imag_unit == S.ImaginaryUnit: + # ValueError may seem more reasonable but since it's a @property, + # we need to use AttributeError to keep from confusing things like + # hasattr. + raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + Number*I") + + return (Float(re_part)._mpf_, Float(im_part)._mpf_) + + def __neg__(self): + if not global_parameters.distribute: + return super().__neg__() + return Mul(S.NegativeOne, self) + +add = AssocOpDispatcher('add') + +from .mul import Mul, _keep_coeff, _unevaluated_Mul +from .numbers import Rational diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/alphabets.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/alphabets.py new file mode 100644 index 0000000000000000000000000000000000000000..1ea2ae1c410ccd30e7ec9551f4cd8b19a36cdba1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/alphabets.py @@ -0,0 +1,4 @@ +greeks = ('alpha', 'beta', 'gamma', 'delta', 'epsilon', 'zeta', + 'eta', 'theta', 'iota', 'kappa', 'lambda', 'mu', 'nu', + 'xi', 'omicron', 'pi', 'rho', 'sigma', 'tau', 'upsilon', + 'phi', 'chi', 'psi', 'omega') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..677e86c5e39390b0b188a5158dd2fabfbac4c760 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions.py @@ -0,0 +1,692 @@ +""" +This module contains the machinery handling assumptions. +Do also consider the guide :ref:`assumptions-guide`. + +All symbolic objects have assumption attributes that can be accessed via +``.is_`` attribute. + +Assumptions determine certain properties of symbolic objects and can +have 3 possible values: ``True``, ``False``, ``None``. ``True`` is returned if the +object has the property and ``False`` is returned if it does not or cannot +(i.e. does not make sense): + + >>> from sympy import I + >>> I.is_algebraic + True + >>> I.is_real + False + >>> I.is_prime + False + +When the property cannot be determined (or when a method is not +implemented) ``None`` will be returned. For example, a generic symbol, ``x``, +may or may not be positive so a value of ``None`` is returned for ``x.is_positive``. + +By default, all symbolic values are in the largest set in the given context +without specifying the property. For example, a symbol that has a property +being integer, is also real, complex, etc. + +Here follows a list of possible assumption names: + +.. glossary:: + + commutative + object commutes with any other object with + respect to multiplication operation. See [12]_. + + complex + object can have only values from the set + of complex numbers. See [13]_. + + imaginary + object value is a number that can be written as a real + number multiplied by the imaginary unit ``I``. See + [3]_. Please note that ``0`` is not considered to be an + imaginary number, see + `issue #7649 `_. + + real + object can have only values from the set + of real numbers. + + extended_real + object can have only values from the set + of real numbers, ``oo`` and ``-oo``. + + integer + object can have only values from the set + of integers. + + odd + even + object can have only values from the set of + odd (even) integers [2]_. + + prime + object is a natural number greater than 1 that has + no positive divisors other than 1 and itself. See [6]_. + + composite + object is a positive integer that has at least one positive + divisor other than 1 or the number itself. See [4]_. + + zero + object has the value of 0. + + nonzero + object is a real number that is not zero. + + rational + object can have only values from the set + of rationals. + + algebraic + object can have only values from the set + of algebraic numbers [11]_. + + transcendental + object can have only values from the set + of transcendental numbers [10]_. + + irrational + object value cannot be represented exactly by :class:`~.Rational`, see [5]_. + + finite + infinite + object absolute value is bounded (arbitrarily large). + See [7]_, [8]_, [9]_. + + negative + nonnegative + object can have only negative (nonnegative) + values [1]_. + + positive + nonpositive + object can have only positive (nonpositive) values. + + extended_negative + extended_nonnegative + extended_positive + extended_nonpositive + extended_nonzero + as without the extended part, but also including infinity with + corresponding sign, e.g., extended_positive includes ``oo`` + + hermitian + antihermitian + object belongs to the field of Hermitian + (antihermitian) operators. + +Examples +======== + + >>> from sympy import Symbol + >>> x = Symbol('x', real=True); x + x + >>> x.is_real + True + >>> x.is_complex + True + +See Also +======== + +.. seealso:: + + :py:class:`sympy.core.numbers.ImaginaryUnit` + :py:class:`sympy.core.numbers.Zero` + :py:class:`sympy.core.numbers.One` + :py:class:`sympy.core.numbers.Infinity` + :py:class:`sympy.core.numbers.NegativeInfinity` + :py:class:`sympy.core.numbers.ComplexInfinity` + +Notes +===== + +The fully-resolved assumptions for any SymPy expression +can be obtained as follows: + + >>> from sympy.core.assumptions import assumptions + >>> x = Symbol('x',positive=True) + >>> assumptions(x + I) + {'commutative': True, 'complex': True, 'composite': False, 'even': + False, 'extended_negative': False, 'extended_nonnegative': False, + 'extended_nonpositive': False, 'extended_nonzero': False, + 'extended_positive': False, 'extended_real': False, 'finite': True, + 'imaginary': False, 'infinite': False, 'integer': False, 'irrational': + False, 'negative': False, 'noninteger': False, 'nonnegative': False, + 'nonpositive': False, 'nonzero': False, 'odd': False, 'positive': + False, 'prime': False, 'rational': False, 'real': False, 'zero': + False} + +Developers Notes +================ + +The current (and possibly incomplete) values are stored +in the ``obj._assumptions dictionary``; queries to getter methods +(with property decorators) or attributes of objects/classes +will return values and update the dictionary. + + >>> eq = x**2 + I + >>> eq._assumptions + {} + >>> eq.is_finite + True + >>> eq._assumptions + {'finite': True, 'infinite': False} + +For a :class:`~.Symbol`, there are two locations for assumptions that may +be of interest. The ``assumptions0`` attribute gives the full set of +assumptions derived from a given set of initial assumptions. The +latter assumptions are stored as ``Symbol._assumptions_orig`` + + >>> Symbol('x', prime=True, even=True)._assumptions_orig + {'even': True, 'prime': True} + +The ``_assumptions_orig`` are not necessarily canonical nor are they filtered +in any way: they records the assumptions used to instantiate a Symbol and (for +storage purposes) represent a more compact representation of the assumptions +needed to recreate the full set in ``Symbol.assumptions0``. + + +References +========== + +.. [1] https://en.wikipedia.org/wiki/Negative_number +.. [2] https://en.wikipedia.org/wiki/Parity_%28mathematics%29 +.. [3] https://en.wikipedia.org/wiki/Imaginary_number +.. [4] https://en.wikipedia.org/wiki/Composite_number +.. [5] https://en.wikipedia.org/wiki/Irrational_number +.. [6] https://en.wikipedia.org/wiki/Prime_number +.. [7] https://en.wikipedia.org/wiki/Finite +.. [8] https://docs.python.org/3/library/math.html#math.isfinite +.. [9] https://numpy.org/doc/stable/reference/generated/numpy.isfinite.html +.. [10] https://en.wikipedia.org/wiki/Transcendental_number +.. [11] https://en.wikipedia.org/wiki/Algebraic_number +.. [12] https://en.wikipedia.org/wiki/Commutative_property +.. [13] https://en.wikipedia.org/wiki/Complex_number + +""" + +from sympy.utilities.exceptions import sympy_deprecation_warning + +from .facts import FactRules, FactKB +from .sympify import sympify + +from sympy.core.random import _assumptions_shuffle as shuffle +from sympy.core.assumptions_generated import generated_assumptions as _assumptions + +def _load_pre_generated_assumption_rules() -> FactRules: + """ Load the assumption rules from pre-generated data + + To update the pre-generated data, see :method::`_generate_assumption_rules` + """ + _assume_rules=FactRules._from_python(_assumptions) + return _assume_rules + +def _generate_assumption_rules(): + """ Generate the default assumption rules + + This method should only be called to update the pre-generated + assumption rules. + + To update the pre-generated assumptions run: bin/ask_update.py + + """ + _assume_rules = FactRules([ + + 'integer -> rational', + 'rational -> real', + 'rational -> algebraic', + 'algebraic -> complex', + 'transcendental == complex & !algebraic', + 'real -> hermitian', + 'imaginary -> complex', + 'imaginary -> antihermitian', + 'extended_real -> commutative', + 'complex -> commutative', + 'complex -> finite', + + 'odd == integer & !even', + 'even == integer & !odd', + + 'real -> complex', + 'extended_real -> real | infinite', + 'real == extended_real & finite', + + 'extended_real == extended_negative | zero | extended_positive', + 'extended_negative == extended_nonpositive & extended_nonzero', + 'extended_positive == extended_nonnegative & extended_nonzero', + + 'extended_nonpositive == extended_real & !extended_positive', + 'extended_nonnegative == extended_real & !extended_negative', + + 'real == negative | zero | positive', + 'negative == nonpositive & nonzero', + 'positive == nonnegative & nonzero', + + 'nonpositive == real & !positive', + 'nonnegative == real & !negative', + + 'positive == extended_positive & finite', + 'negative == extended_negative & finite', + 'nonpositive == extended_nonpositive & finite', + 'nonnegative == extended_nonnegative & finite', + 'nonzero == extended_nonzero & finite', + + 'zero -> even & finite', + 'zero == extended_nonnegative & extended_nonpositive', + 'zero == nonnegative & nonpositive', + 'nonzero -> real', + + 'prime -> integer & positive', + 'composite -> integer & positive & !prime', + '!composite -> !positive | !even | prime', + + 'irrational == real & !rational', + + 'imaginary -> !extended_real', + + 'infinite == !finite', + 'noninteger == extended_real & !integer', + 'extended_nonzero == extended_real & !zero', + ]) + return _assume_rules + + +_assume_rules = _load_pre_generated_assumption_rules() +_assume_defined = _assume_rules.defined_facts.copy() +_assume_defined.add('polar') +_assume_defined = frozenset(_assume_defined) + + +def assumptions(expr, _check=None): + """return the T/F assumptions of ``expr``""" + n = sympify(expr) + if n.is_Symbol: + rv = n.assumptions0 # are any important ones missing? + if _check is not None: + rv = {k: rv[k] for k in set(rv) & set(_check)} + return rv + rv = {} + for k in _assume_defined if _check is None else _check: + v = getattr(n, 'is_{}'.format(k)) + if v is not None: + rv[k] = v + return rv + + +def common_assumptions(exprs, check=None): + """return those assumptions which have the same True or False + value for all the given expressions. + + Examples + ======== + + >>> from sympy.core import common_assumptions + >>> from sympy import oo, pi, sqrt + >>> common_assumptions([-4, 0, sqrt(2), 2, pi, oo]) + {'commutative': True, 'composite': False, + 'extended_real': True, 'imaginary': False, 'odd': False} + + By default, all assumptions are tested; pass an iterable of the + assumptions to limit those that are reported: + + >>> common_assumptions([0, 1, 2], ['positive', 'integer']) + {'integer': True} + """ + check = _assume_defined if check is None else set(check) + if not check or not exprs: + return {} + + # get all assumptions for each + assume = [assumptions(i, _check=check) for i in sympify(exprs)] + # focus on those of interest that are True + for i, e in enumerate(assume): + assume[i] = {k: e[k] for k in set(e) & check} + # what assumptions are in common? + common = set.intersection(*[set(i) for i in assume]) + # which ones hold the same value + a = assume[0] + return {k: a[k] for k in common if all(a[k] == b[k] + for b in assume)} + + +def failing_assumptions(expr, **assumptions): + """ + Return a dictionary containing assumptions with values not + matching those of the passed assumptions. + + Examples + ======== + + >>> from sympy import failing_assumptions, Symbol + + >>> x = Symbol('x', positive=True) + >>> y = Symbol('y') + >>> failing_assumptions(6*x + y, positive=True) + {'positive': None} + + >>> failing_assumptions(x**2 - 1, positive=True) + {'positive': None} + + If *expr* satisfies all of the assumptions, an empty dictionary is returned. + + >>> failing_assumptions(x**2, positive=True) + {} + + """ + expr = sympify(expr) + failed = {} + for k in assumptions: + test = getattr(expr, 'is_%s' % k, None) + if test is not assumptions[k]: + failed[k] = test + return failed # {} or {assumption: value != desired} + + +def check_assumptions(expr, against=None, **assume): + """ + Checks whether assumptions of ``expr`` match the T/F assumptions + given (or possessed by ``against``). True is returned if all + assumptions match; False is returned if there is a mismatch and + the assumption in ``expr`` is not None; else None is returned. + + Explanation + =========== + + *assume* is a dict of assumptions with True or False values + + Examples + ======== + + >>> from sympy import Symbol, pi, I, exp, check_assumptions + >>> check_assumptions(-5, integer=True) + True + >>> check_assumptions(pi, real=True, integer=False) + True + >>> check_assumptions(pi, negative=True) + False + >>> check_assumptions(exp(I*pi/7), real=False) + True + >>> x = Symbol('x', positive=True) + >>> check_assumptions(2*x + 1, positive=True) + True + >>> check_assumptions(-2*x - 5, positive=True) + False + + To check assumptions of *expr* against another variable or expression, + pass the expression or variable as ``against``. + + >>> check_assumptions(2*x + 1, x) + True + + To see if a number matches the assumptions of an expression, pass + the number as the first argument, else its specific assumptions + may not have a non-None value in the expression: + + >>> check_assumptions(x, 3) + >>> check_assumptions(3, x) + True + + ``None`` is returned if ``check_assumptions()`` could not conclude. + + >>> check_assumptions(2*x - 1, x) + + >>> z = Symbol('z') + >>> check_assumptions(z, real=True) + + See Also + ======== + + failing_assumptions + + """ + expr = sympify(expr) + if against is not None: + if assume: + raise ValueError( + 'Expecting `against` or `assume`, not both.') + assume = assumptions(against) + known = True + for k, v in assume.items(): + if v is None: + continue + e = getattr(expr, 'is_' + k, None) + if e is None: + known = None + elif v != e: + return False + return known + + +class StdFactKB(FactKB): + """A FactKB specialized for the built-in rules + + This is the only kind of FactKB that Basic objects should use. + """ + def __init__(self, facts=None): + super().__init__(_assume_rules) + # save a copy of the facts dict + if not facts: + self._generator = {} + elif not isinstance(facts, FactKB): + self._generator = facts.copy() + else: + self._generator = facts.generator + if facts: + self.deduce_all_facts(facts) + + def copy(self): + return self.__class__(self) + + @property + def generator(self): + return self._generator.copy() + + +def as_property(fact): + """Convert a fact name to the name of the corresponding property""" + return 'is_%s' % fact + + +def make_property(fact): + """Create the automagic property corresponding to a fact.""" + + def getit(self): + try: + return self._assumptions[fact] + except KeyError: + if self._assumptions is self.default_assumptions: + self._assumptions = self.default_assumptions.copy() + return _ask(fact, self) + + getit.func_name = as_property(fact) + return property(getit) + + +def _ask(fact, obj): + """ + Find the truth value for a property of an object. + + This function is called when a request is made to see what a fact + value is. + + For this we use several techniques: + + First, the fact-evaluation function is tried, if it exists (for + example _eval_is_integer). Then we try related facts. For example + + rational --> integer + + another example is joined rule: + + integer & !odd --> even + + so in the latter case if we are looking at what 'even' value is, + 'integer' and 'odd' facts will be asked. + + In all cases, when we settle on some fact value, its implications are + deduced, and the result is cached in ._assumptions. + """ + # FactKB which is dict-like and maps facts to their known values: + assumptions = obj._assumptions + + # A dict that maps facts to their handlers: + handler_map = obj._prop_handler + + # This is our queue of facts to check: + facts_to_check = [fact] + facts_queued = {fact} + + # Loop over the queue as it extends + for fact_i in facts_to_check: + + # If fact_i has already been determined then we don't need to rerun the + # handler. There is a potential race condition for multithreaded code + # though because it's possible that fact_i was checked in another + # thread. The main logic of the loop below would potentially skip + # checking assumptions[fact] in this case so we check it once after the + # loop to be sure. + if fact_i in assumptions: + continue + + # Now we call the associated handler for fact_i if it exists. + fact_i_value = None + handler_i = handler_map.get(fact_i) + if handler_i is not None: + fact_i_value = handler_i(obj) + + # If we get a new value for fact_i then we should update our knowledge + # of fact_i as well as any related facts that can be inferred using the + # inference rules connecting the fact_i and any other fact values that + # are already known. + if fact_i_value is not None: + assumptions.deduce_all_facts(((fact_i, fact_i_value),)) + + # Usually if assumptions[fact] is now not None then that is because of + # the call to deduce_all_facts above. The handler for fact_i returned + # True or False and knowing fact_i (which is equal to fact in the first + # iteration) implies knowing a value for fact. It is also possible + # though that independent code e.g. called indirectly by the handler or + # called in another thread in a multithreaded context might have + # resulted in assumptions[fact] being set. Either way we return it. + fact_value = assumptions.get(fact) + if fact_value is not None: + return fact_value + + # Extend the queue with other facts that might determine fact_i. Here + # we randomise the order of the facts that are checked. This should not + # lead to any non-determinism if all handlers are logically consistent + # with the inference rules for the facts. Non-deterministic assumptions + # queries can result from bugs in the handlers that are exposed by this + # call to shuffle. These are pushed to the back of the queue meaning + # that the inference graph is traversed in breadth-first order. + new_facts_to_check = list(_assume_rules.prereq[fact_i] - facts_queued) + shuffle(new_facts_to_check) + facts_to_check.extend(new_facts_to_check) + facts_queued.update(new_facts_to_check) + + # The above loop should be able to handle everything fine in a + # single-threaded context but in multithreaded code it is possible that + # this thread skipped computing a particular fact that was computed in + # another thread (due to the continue). In that case it is possible that + # fact was inferred and is now stored in the assumptions dict but it wasn't + # checked for in the body of the loop. This is an obscure case but to make + # sure we catch it we check once here at the end of the loop. + if fact in assumptions: + return assumptions[fact] + + # This query can not be answered. It's possible that e.g. another thread + # has already stored None for fact but assumptions._tell does not mind if + # we call _tell twice setting the same value. If this raises + # InconsistentAssumptions then it probably means that another thread + # attempted to compute this and got a value of True or False rather than + # None. In that case there must be a bug in at least one of the handlers. + # If the handlers are all deterministic and are consistent with the + # inference rules then the same value should be computed for fact in all + # threads. + assumptions._tell(fact, None) + return None + + +def _prepare_class_assumptions(cls): + """Precompute class level assumptions and generate handlers. + + This is called by Basic.__init_subclass__ each time a Basic subclass is + defined. + """ + + local_defs = {} + for k in _assume_defined: + attrname = as_property(k) + v = cls.__dict__.get(attrname, '') + if isinstance(v, (bool, int, type(None))): + if v is not None: + v = bool(v) + local_defs[k] = v + + defs = {} + for base in reversed(cls.__bases__): + assumptions = getattr(base, '_explicit_class_assumptions', None) + if assumptions is not None: + defs.update(assumptions) + defs.update(local_defs) + + cls._explicit_class_assumptions = defs + cls.default_assumptions = StdFactKB(defs) + + cls._prop_handler = {} + for k in _assume_defined: + eval_is_meth = getattr(cls, '_eval_is_%s' % k, None) + if eval_is_meth is not None: + cls._prop_handler[k] = eval_is_meth + + # Put definite results directly into the class dict, for speed + for k, v in cls.default_assumptions.items(): + setattr(cls, as_property(k), v) + + # protection e.g. for Integer.is_even=F <- (Rational.is_integer=F) + derived_from_bases = set() + for base in cls.__bases__: + default_assumptions = getattr(base, 'default_assumptions', None) + # is an assumption-aware class + if default_assumptions is not None: + derived_from_bases.update(default_assumptions) + + for fact in derived_from_bases - set(cls.default_assumptions): + pname = as_property(fact) + if pname not in cls.__dict__: + setattr(cls, pname, make_property(fact)) + + # Finally, add any missing automagic property (e.g. for Basic) + for fact in _assume_defined: + pname = as_property(fact) + if not hasattr(cls, pname): + setattr(cls, pname, make_property(fact)) + + +# XXX: ManagedProperties used to be the metaclass for Basic but now Basic does +# not use a metaclass. We leave this here for backwards compatibility for now +# in case someone has been using the ManagedProperties class in downstream +# code. The reason that it might have been used is that when subclassing a +# class and wanting to use a metaclass the metaclass must be a subclass of the +# metaclass for the class that is being subclassed. Anyone wanting to subclass +# Basic and use a metaclass in their subclass would have needed to subclass +# ManagedProperties. Here ManagedProperties is not the metaclass for Basic any +# more but it should still be usable as a metaclass for Basic subclasses since +# it is a subclass of type which is now the metaclass for Basic. +class ManagedProperties(type): + def __init__(cls, *args, **kwargs): + msg = ("The ManagedProperties metaclass. " + "Basic does not use metaclasses any more") + sympy_deprecation_warning(msg, + deprecated_since_version="1.12", + active_deprecations_target='managedproperties') + + # Here we still call this function in case someone is using + # ManagedProperties for something that is not a Basic subclass. For + # Basic subclasses this function is now called by __init_subclass__ and + # so this metaclass is not needed any more. + _prepare_class_assumptions(cls) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions_generated.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions_generated.py new file mode 100644 index 0000000000000000000000000000000000000000..b4b2597a72b500155370db385b58e61f0f951984 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/assumptions_generated.py @@ -0,0 +1,1615 @@ +""" +Do NOT manually edit this file. +Instead, run ./bin/ask_update.py. +""" + +defined_facts = [ + 'algebraic', + 'antihermitian', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', +] # defined_facts + + +full_implications = dict( [ + # Implications of algebraic = True: + (('algebraic', True), set( ( + ('commutative', True), + ('complex', True), + ('finite', True), + ('infinite', False), + ('transcendental', False), + ) ), + ), + # Implications of algebraic = False: + (('algebraic', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of antihermitian = True: + (('antihermitian', True), set( ( + ) ), + ), + # Implications of antihermitian = False: + (('antihermitian', False), set( ( + ('imaginary', False), + ) ), + ), + # Implications of commutative = True: + (('commutative', True), set( ( + ) ), + ), + # Implications of commutative = False: + (('commutative', False), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of complex = True: + (('complex', True), set( ( + ('commutative', True), + ('finite', True), + ('infinite', False), + ) ), + ), + # Implications of complex = False: + (('complex', False), set( ( + ('algebraic', False), + ('composite', False), + ('even', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of composite = True: + (('composite', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('positive', True), + ('prime', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of composite = False: + (('composite', False), set( ( + ) ), + ), + # Implications of even = True: + (('even', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('noninteger', False), + ('odd', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of even = False: + (('even', False), set( ( + ('zero', False), + ) ), + ), + # Implications of extended_negative = True: + (('extended_negative', True), set( ( + ('commutative', True), + ('composite', False), + ('extended_nonnegative', False), + ('extended_nonpositive', True), + ('extended_nonzero', True), + ('extended_positive', False), + ('extended_real', True), + ('imaginary', False), + ('nonnegative', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of extended_negative = False: + (('extended_negative', False), set( ( + ('negative', False), + ) ), + ), + # Implications of extended_nonnegative = True: + (('extended_nonnegative', True), set( ( + ('commutative', True), + ('extended_negative', False), + ('extended_real', True), + ('imaginary', False), + ('negative', False), + ) ), + ), + # Implications of extended_nonnegative = False: + (('extended_nonnegative', False), set( ( + ('composite', False), + ('extended_positive', False), + ('nonnegative', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonpositive = True: + (('extended_nonpositive', True), set( ( + ('commutative', True), + ('composite', False), + ('extended_positive', False), + ('extended_real', True), + ('imaginary', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_nonpositive = False: + (('extended_nonpositive', False), set( ( + ('extended_negative', False), + ('negative', False), + ('nonpositive', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonzero = True: + (('extended_nonzero', True), set( ( + ('commutative', True), + ('extended_real', True), + ('imaginary', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonzero = False: + (('extended_nonzero', False), set( ( + ('composite', False), + ('extended_negative', False), + ('extended_positive', False), + ('negative', False), + ('nonzero', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_positive = True: + (('extended_positive', True), set( ( + ('commutative', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_real', True), + ('imaginary', False), + ('negative', False), + ('nonpositive', False), + ('zero', False), + ) ), + ), + # Implications of extended_positive = False: + (('extended_positive', False), set( ( + ('composite', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_real = True: + (('extended_real', True), set( ( + ('commutative', True), + ('imaginary', False), + ) ), + ), + # Implications of extended_real = False: + (('extended_real', False), set( ( + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of finite = True: + (('finite', True), set( ( + ('infinite', False), + ) ), + ), + # Implications of finite = False: + (('finite', False), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('imaginary', False), + ('infinite', True), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of hermitian = True: + (('hermitian', True), set( ( + ) ), + ), + # Implications of hermitian = False: + (('hermitian', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of imaginary = True: + (('imaginary', True), set( ( + ('antihermitian', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', False), + ('finite', True), + ('infinite', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of imaginary = False: + (('imaginary', False), set( ( + ) ), + ), + # Implications of infinite = True: + (('infinite', True), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('finite', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of infinite = False: + (('infinite', False), set( ( + ('finite', True), + ) ), + ), + # Implications of integer = True: + (('integer', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('irrational', False), + ('noninteger', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of integer = False: + (('integer', False), set( ( + ('composite', False), + ('even', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of irrational = True: + (('irrational', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', False), + ('noninteger', True), + ('nonzero', True), + ('odd', False), + ('prime', False), + ('rational', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of irrational = False: + (('irrational', False), set( ( + ) ), + ), + # Implications of negative = True: + (('negative', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_negative', True), + ('extended_nonnegative', False), + ('extended_nonpositive', True), + ('extended_nonzero', True), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('nonnegative', False), + ('nonpositive', True), + ('nonzero', True), + ('positive', False), + ('prime', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of negative = False: + (('negative', False), set( ( + ) ), + ), + # Implications of noninteger = True: + (('noninteger', True), set( ( + ('commutative', True), + ('composite', False), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('imaginary', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of noninteger = False: + (('noninteger', False), set( ( + ) ), + ), + # Implications of nonnegative = True: + (('nonnegative', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('negative', False), + ('real', True), + ) ), + ), + # Implications of nonnegative = False: + (('nonnegative', False), set( ( + ('composite', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of nonpositive = True: + (('nonpositive', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_nonpositive', True), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('positive', False), + ('prime', False), + ('real', True), + ) ), + ), + # Implications of nonpositive = False: + (('nonpositive', False), set( ( + ('negative', False), + ('zero', False), + ) ), + ), + # Implications of nonzero = True: + (('nonzero', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of nonzero = False: + (('nonzero', False), set( ( + ('composite', False), + ('negative', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of odd = True: + (('odd', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('noninteger', False), + ('nonzero', True), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of odd = False: + (('odd', False), set( ( + ) ), + ), + # Implications of positive = True: + (('positive', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('negative', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of positive = False: + (('positive', False), set( ( + ('composite', False), + ('prime', False), + ) ), + ), + # Implications of prime = True: + (('prime', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('positive', True), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of prime = False: + (('prime', False), set( ( + ) ), + ), + # Implications of rational = True: + (('rational', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('irrational', False), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of rational = False: + (('rational', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of real = True: + (('real', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ) ), + ), + # Implications of real = False: + (('real', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of transcendental = True: + (('transcendental', True), set( ( + ('algebraic', False), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('finite', True), + ('infinite', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of transcendental = False: + (('transcendental', False), set( ( + ) ), + ), + # Implications of zero = True: + (('zero', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', True), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', True), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of zero = False: + (('zero', False), set( ( + ) ), + ), + ] ) # full_implications + + +prereq = { + + # facts that could determine the value of algebraic + 'algebraic': { + 'commutative', + 'complex', + 'composite', + 'even', + 'finite', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of antihermitian + 'antihermitian': { + 'imaginary', + }, + + # facts that could determine the value of commutative + 'commutative': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of complex + 'complex': { + 'algebraic', + 'commutative', + 'composite', + 'even', + 'finite', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of composite + 'composite': { + 'algebraic', + 'commutative', + 'complex', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of even + 'even': { + 'algebraic', + 'commutative', + 'complex', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'noninteger', + 'odd', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of extended_negative + 'extended_negative': { + 'commutative', + 'composite', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonnegative', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonnegative + 'extended_nonnegative': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonnegative', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonpositive + 'extended_nonpositive': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonpositive', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonzero + 'extended_nonzero': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'irrational', + 'negative', + 'noninteger', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_positive + 'extended_positive': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_real', + 'imaginary', + 'negative', + 'nonpositive', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_real + 'extended_real': { + 'commutative', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of finite + 'finite': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of hermitian + 'hermitian': { + 'composite', + 'even', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of imaginary + 'imaginary': { + 'antihermitian', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of infinite + 'infinite': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'finite', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of integer + 'integer': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'irrational', + 'noninteger', + 'odd', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of irrational + 'irrational': { + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of negative + 'negative': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of noninteger + 'noninteger': { + 'commutative', + 'composite', + 'even', + 'extended_real', + 'imaginary', + 'integer', + 'irrational', + 'odd', + 'prime', + 'zero', + }, + + # facts that could determine the value of nonnegative + 'nonnegative': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of nonpositive + 'nonpositive': { + 'commutative', + 'complex', + 'composite', + 'extended_nonpositive', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of nonzero + 'nonzero': { + 'commutative', + 'complex', + 'composite', + 'extended_nonzero', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'irrational', + 'negative', + 'odd', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of odd + 'odd': { + 'algebraic', + 'commutative', + 'complex', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'noninteger', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of positive + 'positive': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of prime + 'prime': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of rational + 'rational': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'odd', + 'prime', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of real + 'real': { + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'zero', + }, + + # facts that could determine the value of transcendental + 'transcendental': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'finite', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'zero', + }, + + # facts that could determine the value of zero + 'zero': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + }, + +} # prereq + + +# Note: the order of the beta rules is used in the beta_triggers +beta_rules = [ + + # Rules implying composite = True + ({('even', True), ('positive', True), ('prime', False)}, + ('composite', True)), + + # Rules implying even = False + ({('composite', False), ('positive', True), ('prime', False)}, + ('even', False)), + + # Rules implying even = True + ({('integer', True), ('odd', False)}, + ('even', True)), + + # Rules implying extended_negative = True + ({('extended_positive', False), ('extended_real', True), ('zero', False)}, + ('extended_negative', True)), + ({('extended_nonpositive', True), ('extended_nonzero', True)}, + ('extended_negative', True)), + + # Rules implying extended_nonnegative = True + ({('extended_negative', False), ('extended_real', True)}, + ('extended_nonnegative', True)), + + # Rules implying extended_nonpositive = True + ({('extended_positive', False), ('extended_real', True)}, + ('extended_nonpositive', True)), + + # Rules implying extended_nonzero = True + ({('extended_real', True), ('zero', False)}, + ('extended_nonzero', True)), + + # Rules implying extended_positive = True + ({('extended_negative', False), ('extended_real', True), ('zero', False)}, + ('extended_positive', True)), + ({('extended_nonnegative', True), ('extended_nonzero', True)}, + ('extended_positive', True)), + + # Rules implying extended_real = False + ({('infinite', False), ('real', False)}, + ('extended_real', False)), + ({('extended_negative', False), ('extended_positive', False), ('zero', False)}, + ('extended_real', False)), + + # Rules implying infinite = True + ({('extended_real', True), ('real', False)}, + ('infinite', True)), + + # Rules implying irrational = True + ({('rational', False), ('real', True)}, + ('irrational', True)), + + # Rules implying negative = True + ({('positive', False), ('real', True), ('zero', False)}, + ('negative', True)), + ({('nonpositive', True), ('nonzero', True)}, + ('negative', True)), + ({('extended_negative', True), ('finite', True)}, + ('negative', True)), + + # Rules implying noninteger = True + ({('extended_real', True), ('integer', False)}, + ('noninteger', True)), + + # Rules implying nonnegative = True + ({('negative', False), ('real', True)}, + ('nonnegative', True)), + ({('extended_nonnegative', True), ('finite', True)}, + ('nonnegative', True)), + + # Rules implying nonpositive = True + ({('positive', False), ('real', True)}, + ('nonpositive', True)), + ({('extended_nonpositive', True), ('finite', True)}, + ('nonpositive', True)), + + # Rules implying nonzero = True + ({('extended_nonzero', True), ('finite', True)}, + ('nonzero', True)), + + # Rules implying odd = True + ({('even', False), ('integer', True)}, + ('odd', True)), + + # Rules implying positive = False + ({('composite', False), ('even', True), ('prime', False)}, + ('positive', False)), + + # Rules implying positive = True + ({('negative', False), ('real', True), ('zero', False)}, + ('positive', True)), + ({('nonnegative', True), ('nonzero', True)}, + ('positive', True)), + ({('extended_positive', True), ('finite', True)}, + ('positive', True)), + + # Rules implying prime = True + ({('composite', False), ('even', True), ('positive', True)}, + ('prime', True)), + + # Rules implying real = False + ({('negative', False), ('positive', False), ('zero', False)}, + ('real', False)), + + # Rules implying real = True + ({('extended_real', True), ('infinite', False)}, + ('real', True)), + ({('extended_real', True), ('finite', True)}, + ('real', True)), + + # Rules implying transcendental = True + ({('algebraic', False), ('complex', True)}, + ('transcendental', True)), + + # Rules implying zero = True + ({('extended_negative', False), ('extended_positive', False), ('extended_real', True)}, + ('zero', True)), + ({('negative', False), ('positive', False), ('real', True)}, + ('zero', True)), + ({('extended_nonnegative', True), ('extended_nonpositive', True)}, + ('zero', True)), + ({('nonnegative', True), ('nonpositive', True)}, + ('zero', True)), + +] # beta_rules +beta_triggers = { + ('algebraic', False): [32, 11, 3, 8, 29, 14, 25, 13, 17, 7], + ('algebraic', True): [10, 30, 31, 27, 16, 21, 19, 22], + ('antihermitian', False): [], + ('commutative', False): [], + ('complex', False): [10, 12, 11, 3, 8, 17, 7], + ('complex', True): [32, 10, 30, 31, 27, 16, 21, 19, 22], + ('composite', False): [1, 28, 24], + ('composite', True): [23, 2], + ('even', False): [23, 11, 3, 8, 29, 14, 25, 7], + ('even', True): [3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 0, 28, 24, 7], + ('extended_negative', False): [11, 33, 8, 5, 29, 34, 25, 18], + ('extended_negative', True): [30, 12, 31, 29, 14, 20, 16, 21, 22, 17], + ('extended_nonnegative', False): [11, 3, 6, 29, 14, 20, 7], + ('extended_nonnegative', True): [30, 12, 31, 33, 8, 9, 6, 29, 34, 25, 18, 19, 35, 17, 7], + ('extended_nonpositive', False): [11, 8, 5, 29, 25, 18, 7], + ('extended_nonpositive', True): [30, 12, 31, 3, 33, 4, 5, 29, 14, 34, 20, 21, 35, 17, 7], + ('extended_nonzero', False): [11, 33, 6, 5, 29, 34, 20, 18], + ('extended_nonzero', True): [30, 12, 31, 3, 8, 4, 9, 6, 5, 29, 14, 25, 22, 17], + ('extended_positive', False): [11, 3, 33, 6, 29, 14, 34, 20], + ('extended_positive', True): [30, 12, 31, 29, 25, 18, 27, 19, 22, 17], + ('extended_real', False): [], + ('extended_real', True): [30, 12, 31, 3, 33, 8, 6, 5, 17, 7], + ('finite', False): [11, 3, 8, 17, 7], + ('finite', True): [10, 30, 31, 27, 16, 21, 19, 22], + ('hermitian', False): [10, 12, 11, 3, 8, 17, 7], + ('imaginary', True): [32], + ('infinite', False): [10, 30, 31, 27, 16, 21, 19, 22], + ('infinite', True): [11, 3, 8, 17, 7], + ('integer', False): [11, 3, 8, 29, 14, 25, 17, 7], + ('integer', True): [23, 2, 3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 7], + ('irrational', True): [32, 3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19], + ('negative', False): [29, 34, 25, 18], + ('negative', True): [32, 13, 17], + ('noninteger', True): [30, 12, 31, 3, 8, 4, 9, 6, 5, 29, 14, 25, 22], + ('nonnegative', False): [11, 3, 8, 29, 14, 20, 7], + ('nonnegative', True): [32, 33, 8, 9, 6, 34, 25, 26, 20, 27, 21, 22, 35, 36, 13, 17, 7], + ('nonpositive', False): [11, 3, 8, 29, 25, 18, 7], + ('nonpositive', True): [32, 3, 33, 4, 5, 14, 34, 15, 18, 16, 19, 22, 35, 36, 13, 17, 7], + ('nonzero', False): [29, 34, 20, 18], + ('nonzero', True): [32, 3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19, 13, 17], + ('odd', False): [2], + ('odd', True): [3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19], + ('positive', False): [29, 14, 34, 20], + ('positive', True): [32, 0, 1, 28, 13, 17], + ('prime', False): [0, 1, 24], + ('prime', True): [23, 2], + ('rational', False): [11, 3, 8, 29, 14, 25, 13, 17, 7], + ('rational', True): [3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 17, 7], + ('real', False): [10, 12, 11, 3, 8, 17, 7], + ('real', True): [32, 3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 13, 17, 7], + ('transcendental', True): [10, 30, 31, 11, 3, 8, 29, 14, 25, 27, 16, 21, 19, 22, 13, 17, 7], + ('zero', False): [11, 3, 8, 29, 14, 25, 7], + ('zero', True): [], +} # beta_triggers + + +generated_assumptions = {'defined_facts': defined_facts, 'full_implications': full_implications, + 'prereq': prereq, 'beta_rules': beta_rules, 'beta_triggers': beta_triggers} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/backend.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/backend.py new file mode 100644 index 0000000000000000000000000000000000000000..34a4e05a4a4ac50d0830960cb324871a20e9a12d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/backend.py @@ -0,0 +1,120 @@ +import os +USE_SYMENGINE = os.getenv('USE_SYMENGINE', '0') +USE_SYMENGINE = USE_SYMENGINE.lower() in ('1', 't', 'true') # type: ignore + +if USE_SYMENGINE: + from symengine import (Symbol, Integer, sympify as sympify_symengine, S, + SympifyError, exp, log, gamma, sqrt, I, E, pi, Matrix, + sin, cos, tan, cot, csc, sec, asin, acos, atan, acot, acsc, asec, + sinh, cosh, tanh, coth, asinh, acosh, atanh, acoth, + lambdify, symarray, diff, zeros, eye, diag, ones, + expand, Function, symbols, var, Add, Mul, Derivative, + ImmutableMatrix, MatrixBase, Rational, Basic) + from symengine.lib.symengine_wrapper import gcd as igcd + from symengine import AppliedUndef + + def sympify(a, *, strict=False): + """ + Notes + ===== + + SymEngine's ``sympify`` does not accept keyword arguments and is + therefore not compatible with SymPy's ``sympify`` with ``strict=True`` + (which ensures that only the types for which an explicit conversion has + been defined are converted). This wrapper adds an additional parameter + ``strict`` (with default ``False``) that will raise a ``SympifyError`` + if ``strict=True`` and the argument passed to the parameter ``a`` is a + string. + + See Also + ======== + + sympify: Converts an arbitrary expression to a type that can be used + inside SymPy. + + """ + # The parameter ``a`` is used for this function to keep compatibility + # with the SymEngine docstring. + if strict and isinstance(a, str): + raise SympifyError(a) + return sympify_symengine(a) + + # Keep the SymEngine docstring and append the additional "Notes" and "See + # Also" sections. Replacement of spaces is required to correctly format the + # indentation of the combined docstring. + sympify.__doc__ = ( + sympify_symengine.__doc__ + + sympify.__doc__.replace(' ', ' ') # type: ignore + ) +else: + from sympy.core.add import Add + from sympy.core.basic import Basic + from sympy.core.function import (diff, Function, AppliedUndef, + expand, Derivative) + from sympy.core.mul import Mul + from sympy.core.intfunc import igcd + from sympy.core.numbers import pi, I, Integer, Rational, E + from sympy.core.singleton import S + from sympy.core.symbol import Symbol, var, symbols + from sympy.core.sympify import SympifyError, sympify + from sympy.functions.elementary.exponential import log, exp + from sympy.functions.elementary.hyperbolic import (coth, sinh, + acosh, acoth, tanh, asinh, atanh, cosh) + from sympy.functions.elementary.miscellaneous import sqrt + from sympy.functions.elementary.trigonometric import (csc, + asec, cos, atan, sec, acot, asin, tan, sin, cot, acsc, acos) + from sympy.functions.special.gamma_functions import gamma + from sympy.matrices.dense import (eye, zeros, diag, Matrix, + ones, symarray) + from sympy.matrices.immutable import ImmutableMatrix + from sympy.matrices.matrixbase import MatrixBase + from sympy.utilities.lambdify import lambdify + + +# +# XXX: Handling of immutable and mutable matrices in SymEngine is inconsistent +# with SymPy's matrix classes in at least SymEngine version 0.7.0. Until that +# is fixed the function below is needed for consistent behaviour when +# attempting to simplify a matrix. +# +# Expected behaviour of a SymPy mutable/immutable matrix .simplify() method: +# +# Matrix.simplify() : works in place, returns None +# ImmutableMatrix.simplify() : returns a simplified copy +# +# In SymEngine both mutable and immutable matrices simplify in place and return +# None. This is inconsistent with the matrix being "immutable" and also the +# returned None leads to problems in the mechanics module. +# +# The simplify function should not be used because simplify(M) sympifies the +# matrix M and the SymEngine matrices all sympify to SymPy matrices. If we want +# to work with SymEngine matrices then we need to use their .simplify() method +# but that method does not work correctly with immutable matrices. +# +# The _simplify_matrix function can be removed when the SymEngine bug is fixed. +# Since this should be a temporary problem we do not make this function part of +# the public API. +# +# SymEngine issue: https://github.com/symengine/symengine.py/issues/363 +# + +def _simplify_matrix(M): + """Return a simplified copy of the matrix M""" + if not isinstance(M, (Matrix, ImmutableMatrix)): + raise TypeError("The matrix M must be an instance of Matrix or ImmutableMatrix") + Mnew = M.as_mutable() # makes a copy if mutable + Mnew.simplify() + if isinstance(M, ImmutableMatrix): + Mnew = Mnew.as_immutable() + return Mnew + + +__all__ = [ + 'Symbol', 'Integer', 'sympify', 'S', 'SympifyError', 'exp', 'log', + 'gamma', 'sqrt', 'I', 'E', 'pi', 'Matrix', 'sin', 'cos', 'tan', 'cot', + 'csc', 'sec', 'asin', 'acos', 'atan', 'acot', 'acsc', 'asec', 'sinh', + 'cosh', 'tanh', 'coth', 'asinh', 'acosh', 'atanh', 'acoth', 'lambdify', + 'symarray', 'diff', 'zeros', 'eye', 'diag', 'ones', 'expand', 'Function', + 'symbols', 'var', 'Add', 'Mul', 'Derivative', 'ImmutableMatrix', + 'MatrixBase', 'Rational', 'Basic', 'igcd', 'AppliedUndef', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/basic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/basic.py new file mode 100644 index 0000000000000000000000000000000000000000..92f6e710113ce0523ad15100abb0acd00f03f741 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/basic.py @@ -0,0 +1,2355 @@ +"""Base class for all the objects in SymPy""" +from __future__ import annotations + +from collections import Counter +from collections.abc import Mapping, Iterable +from itertools import zip_longest +from functools import cmp_to_key +from typing import TYPE_CHECKING, overload + +from .assumptions import _prepare_class_assumptions +from .cache import cacheit +from .sympify import _sympify, sympify, SympifyError, _external_converter +from .sorting import ordered +from .kind import Kind, UndefinedKind +from ._print_helpers import Printable + +from sympy.utilities.decorator import deprecated +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import iterable, numbered_symbols +from sympy.utilities.misc import filldedent, func_name + + +if TYPE_CHECKING: + from typing import ClassVar, TypeVar, Any + from typing_extensions import Self + from .assumptions import StdFactKB + from .symbol import Symbol + + Tbasic = TypeVar("Tbasic", bound='Basic') + + +def as_Basic(expr): + """Return expr as a Basic instance using strict sympify + or raise a TypeError; this is just a wrapper to _sympify, + raising a TypeError instead of a SympifyError.""" + try: + return _sympify(expr) + except SympifyError: + raise TypeError( + 'Argument must be a Basic object, not `%s`' % func_name( + expr)) + + +# Key for sorting commutative args in canonical order +# by name. This is used for canonical ordering of the +# args for Add and Mul *if* the names of both classes +# being compared appear here. Some things in this list +# are not spelled the same as their name so they do not, +# in effect, appear here. See Basic.compare. +ordering_of_classes = [ + # singleton numbers + 'Zero', 'One', 'Half', 'Infinity', 'NaN', 'NegativeOne', 'NegativeInfinity', + # numbers + 'Integer', 'Rational', 'Float', + # singleton symbols + 'Exp1', 'Pi', 'ImaginaryUnit', + # symbols + 'Symbol', 'Wild', + # arithmetic operations + 'Pow', 'Mul', 'Add', + # function values + 'Derivative', 'Integral', + # defined singleton functions + 'Abs', 'Sign', 'Sqrt', + 'Floor', 'Ceiling', + 'Re', 'Im', 'Arg', + 'Conjugate', + 'Exp', 'Log', + 'Sin', 'Cos', 'Tan', 'Cot', 'ASin', 'ACos', 'ATan', 'ACot', + 'Sinh', 'Cosh', 'Tanh', 'Coth', 'ASinh', 'ACosh', 'ATanh', 'ACoth', + 'RisingFactorial', 'FallingFactorial', + 'factorial', 'binomial', + 'Gamma', 'LowerGamma', 'UpperGamma', 'PolyGamma', + 'Erf', + # special polynomials + 'Chebyshev', 'Chebyshev2', + # undefined functions + 'Function', 'WildFunction', + # anonymous functions + 'Lambda', + # Landau O symbol + 'Order', + # relational operations + 'Equality', 'Unequality', 'StrictGreaterThan', 'StrictLessThan', + 'GreaterThan', 'LessThan', +] + +def _cmp_name(x: type, y: type) -> int: + """return -1, 0, 1 if the name of x is before that of y. + A string comparison is done if either name does not appear + in `ordering_of_classes`. This is the helper for + ``Basic.compare`` + + Examples + ======== + + >>> from sympy import cos, tan, sin + >>> from sympy.core import basic + >>> save = basic.ordering_of_classes + >>> basic.ordering_of_classes = () + >>> basic._cmp_name(cos, tan) + -1 + >>> basic.ordering_of_classes = ["tan", "sin", "cos"] + >>> basic._cmp_name(cos, tan) + 1 + >>> basic._cmp_name(sin, cos) + -1 + >>> basic.ordering_of_classes = save + + """ + n1 = x.__name__ + n2 = y.__name__ + if n1 == n2: + return 0 + + # If the other object is not a Basic subclass, then we are not equal to it. + if not issubclass(y, Basic): + return -1 + + UNKNOWN = len(ordering_of_classes) + 1 + try: + i1 = ordering_of_classes.index(n1) + except ValueError: + i1 = UNKNOWN + try: + i2 = ordering_of_classes.index(n2) + except ValueError: + i2 = UNKNOWN + if i1 == UNKNOWN and i2 == UNKNOWN: + return (n1 > n2) - (n1 < n2) + return (i1 > i2) - (i1 < i2) + + + +@cacheit +def _get_postprocessors(clsname, arg_type): + # Since only Add, Mul, Pow can be clsname, this cache + # is not quadratic. + postprocessors = set() + mappings = _get_postprocessors_for_type(arg_type) + for mapping in mappings: + f = mapping.get(clsname, None) + if f is not None: + postprocessors.update(f) + return postprocessors + +@cacheit +def _get_postprocessors_for_type(arg_type): + return tuple( + Basic._constructor_postprocessor_mapping[cls] + for cls in arg_type.mro() + if cls in Basic._constructor_postprocessor_mapping + ) + + +class Basic(Printable): + """ + Base class for all SymPy objects. + + Notes and conventions + ===================== + + 1) Always use ``.args``, when accessing parameters of some instance: + + >>> from sympy import cot + >>> from sympy.abc import x, y + + >>> cot(x).args + (x,) + + >>> cot(x).args[0] + x + + >>> (x*y).args + (x, y) + + >>> (x*y).args[1] + y + + + 2) Never use internal methods or variables (the ones prefixed with ``_``): + + >>> cot(x)._args # do not use this, use cot(x).args instead + (x,) + + + 3) By "SymPy object" we mean something that can be returned by + ``sympify``. But not all objects one encounters using SymPy are + subclasses of Basic. For example, mutable objects are not: + + >>> from sympy import Basic, Matrix, sympify + >>> A = Matrix([[1, 2], [3, 4]]).as_mutable() + >>> isinstance(A, Basic) + False + + >>> B = sympify(A) + >>> isinstance(B, Basic) + True + """ + __slots__ = ('_mhash', # hash value + '_args', # arguments + '_assumptions' + ) + + _args: tuple[Basic, ...] + _mhash: int | None + + @property + def __sympy__(self): + return True + + def __init_subclass__(cls): + # Initialize the default_assumptions FactKB and also any assumptions + # property methods. This method will only be called for subclasses of + # Basic but not for Basic itself so we call + # _prepare_class_assumptions(Basic) below the class definition. + super().__init_subclass__() + _prepare_class_assumptions(cls) + + # To be overridden with True in the appropriate subclasses + is_number = False + is_Atom = False + is_Symbol = False + is_symbol = False + is_Indexed = False + is_Dummy = False + is_Wild = False + is_Function = False + is_Add = False + is_Mul = False + is_Pow = False + is_Number = False + is_Float = False + is_Rational = False + is_Integer = False + is_NumberSymbol = False + is_Order = False + is_Derivative = False + is_Piecewise = False + is_Poly = False + is_AlgebraicNumber = False + is_Relational = False + is_Equality = False + is_Boolean = False + is_Not = False + is_Matrix = False + is_Vector = False + is_Point = False + is_MatAdd = False + is_MatMul = False + + default_assumptions: ClassVar[StdFactKB] + + is_composite: bool | None + is_noninteger: bool | None + is_extended_positive: bool | None + is_negative: bool | None + is_complex: bool | None + is_extended_nonpositive: bool | None + is_integer: bool | None + is_positive: bool | None + is_rational: bool | None + is_extended_nonnegative: bool | None + is_infinite: bool | None + is_antihermitian: bool | None + is_extended_negative: bool | None + is_extended_real: bool | None + is_finite: bool | None + is_polar: bool | None + is_imaginary: bool | None + is_transcendental: bool | None + is_extended_nonzero: bool | None + is_nonzero: bool | None + is_odd: bool | None + is_algebraic: bool | None + is_prime: bool | None + is_commutative: bool | None + is_nonnegative: bool | None + is_nonpositive: bool | None + is_hermitian: bool | None + is_irrational: bool | None + is_real: bool | None + is_zero: bool | None + is_even: bool | None + + kind: Kind = UndefinedKind + + def __new__(cls, *args): + obj = object.__new__(cls) + obj._assumptions = cls.default_assumptions + obj._mhash = None # will be set by __hash__ method. + + obj._args = args # all items in args must be Basic objects + return obj + + def copy(self): + return self.func(*self.args) + + def __getnewargs__(self): + return self.args + + def __getstate__(self): + return None + + def __setstate__(self, state): + for name, value in state.items(): + setattr(self, name, value) + + def __reduce_ex__(self, protocol): + if protocol < 2: + msg = "Only pickle protocol 2 or higher is supported by SymPy" + raise NotImplementedError(msg) + return super().__reduce_ex__(protocol) + + def __hash__(self) -> int: + # hash cannot be cached using cache_it because infinite recurrence + # occurs as hash is needed for setting cache dictionary keys + h = self._mhash + if h is None: + h = hash((type(self).__name__,) + self._hashable_content()) + self._mhash = h + return h + + def _hashable_content(self): + """Return a tuple of information about self that can be used to + compute the hash. If a class defines additional attributes, + like ``name`` in Symbol, then this method should be updated + accordingly to return such relevant attributes. + + Defining more than _hashable_content is necessary if __eq__ has + been defined by a class. See note about this in Basic.__eq__.""" + return self._args + + @property + def assumptions0(self): + """ + Return object `type` assumptions. + + For example: + + Symbol('x', real=True) + Symbol('x', integer=True) + + are different objects. In other words, besides Python type (Symbol in + this case), the initial assumptions are also forming their typeinfo. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.abc import x + >>> x.assumptions0 + {'commutative': True} + >>> x = Symbol("x", positive=True) + >>> x.assumptions0 + {'commutative': True, 'complex': True, 'extended_negative': False, + 'extended_nonnegative': True, 'extended_nonpositive': False, + 'extended_nonzero': True, 'extended_positive': True, 'extended_real': + True, 'finite': True, 'hermitian': True, 'imaginary': False, + 'infinite': False, 'negative': False, 'nonnegative': True, + 'nonpositive': False, 'nonzero': True, 'positive': True, 'real': + True, 'zero': False} + """ + return {} + + def compare(self, other): + """ + Return -1, 0, 1 if the object is less than, equal, + or greater than other in a canonical sense. + Non-Basic are always greater than Basic. + If both names of the classes being compared appear + in the `ordering_of_classes` then the ordering will + depend on the appearance of the names there. + If either does not appear in that list, then the + comparison is based on the class name. + If the names are the same then a comparison is made + on the length of the hashable content. + Items of the equal-lengthed contents are then + successively compared using the same rules. If there + is never a difference then 0 is returned. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x.compare(y) + -1 + >>> x.compare(x) + 0 + >>> y.compare(x) + 1 + + """ + # all redefinitions of __cmp__ method should start with the + # following lines: + if self is other: + return 0 + n1 = self.__class__ + n2 = other.__class__ + c = _cmp_name(n1, n2) + if c: + return c + # + st = self._hashable_content() + ot = other._hashable_content() + len_st = len(st) + len_ot = len(ot) + c = (len_st > len_ot) - (len_st < len_ot) + if c: + return c + for l, r in zip(st, ot): + if isinstance(l, Basic): + c = l.compare(r) + elif isinstance(l, frozenset): + l = Basic(*l) if isinstance(l, frozenset) else l + r = Basic(*r) if isinstance(r, frozenset) else r + c = l.compare(r) + else: + c = (l > r) - (l < r) + if c: + return c + return 0 + + @classmethod + def fromiter(cls, args, **assumptions): + """ + Create a new object from an iterable. + + This is a convenience function that allows one to create objects from + any iterable, without having to convert to a list or tuple first. + + Examples + ======== + + >>> from sympy import Tuple + >>> Tuple.fromiter(i for i in range(5)) + (0, 1, 2, 3, 4) + + """ + return cls(*tuple(args), **assumptions) + + @classmethod + def class_key(cls) -> tuple[int, int, str]: + """Nice order of classes.""" + return 5, 0, cls.__name__ + + @cacheit + def sort_key(self, order=None): + """ + Return a sort key. + + Examples + ======== + + >>> from sympy import S, I + + >>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key()) + [1/2, -I, I] + + >>> S("[x, 1/x, 1/x**2, x**2, x**(1/2), x**(1/4), x**(3/2)]") + [x, 1/x, x**(-2), x**2, sqrt(x), x**(1/4), x**(3/2)] + >>> sorted(_, key=lambda x: x.sort_key()) + [x**(-2), 1/x, x**(1/4), sqrt(x), x, x**(3/2), x**2] + + """ + + # XXX: remove this when issue 5169 is fixed + def inner_key(arg): + if isinstance(arg, Basic): + return arg.sort_key(order) + else: + return arg + + args = self._sorted_args + args = len(args), tuple([inner_key(arg) for arg in args]) + return self.class_key(), args, S.One.sort_key(), S.One + + def _do_eq_sympify(self, other): + """Returns a boolean indicating whether a == b when either a + or b is not a Basic. This is only done for types that were either + added to `converter` by a 3rd party or when the object has `_sympy_` + defined. This essentially reuses the code in `_sympify` that is + specific for this use case. Non-user defined types that are meant + to work with SymPy should be handled directly in the __eq__ methods + of the `Basic` classes it could equate to and not be converted. Note + that after conversion, `==` is used again since it is not + necessarily clear whether `self` or `other`'s __eq__ method needs + to be used.""" + for superclass in type(other).__mro__: + conv = _external_converter.get(superclass) + if conv is not None: + return self == conv(other) + if hasattr(other, '_sympy_'): + return self == other._sympy_() + return NotImplemented + + def __eq__(self, other): + """Return a boolean indicating whether a == b on the basis of + their symbolic trees. + + This is the same as a.compare(b) == 0 but faster. + + Notes + ===== + + If a class that overrides __eq__() needs to retain the + implementation of __hash__() from a parent class, the + interpreter must be told this explicitly by setting + __hash__ : Callable[[object], int] = .__hash__. + Otherwise the inheritance of __hash__() will be blocked, + just as if __hash__ had been explicitly set to None. + + References + ========== + + from https://docs.python.org/dev/reference/datamodel.html#object.__hash__ + """ + if self is other: + return True + + if not isinstance(other, Basic): + return self._do_eq_sympify(other) + + # check for pure number expr + if not (self.is_Number and other.is_Number) and ( + type(self) != type(other)): + return False + a, b = self._hashable_content(), other._hashable_content() + if a != b: + return False + # check number *in* an expression + for a, b in zip(a, b): + if not isinstance(a, Basic): + continue + if a.is_Number and type(a) != type(b): + return False + return True + + def __ne__(self, other): + """``a != b`` -> Compare two symbolic trees and see whether they are different + + this is the same as: + + ``a.compare(b) != 0`` + + but faster + """ + return not self == other + + def dummy_eq(self, other, symbol=None): + """ + Compare two expressions and handle dummy symbols. + + Examples + ======== + + >>> from sympy import Dummy + >>> from sympy.abc import x, y + + >>> u = Dummy('u') + + >>> (u**2 + 1).dummy_eq(x**2 + 1) + True + >>> (u**2 + 1) == (x**2 + 1) + False + + >>> (u**2 + y).dummy_eq(x**2 + y, x) + True + >>> (u**2 + y).dummy_eq(x**2 + y, y) + False + + """ + s = self.as_dummy() + o = _sympify(other) + o = o.as_dummy() + + dummy_symbols = [i for i in s.free_symbols if i.is_Dummy] + + if len(dummy_symbols) == 1: + dummy = dummy_symbols.pop() + else: + return s == o + + if symbol is None: + symbols = o.free_symbols + + if len(symbols) == 1: + symbol = symbols.pop() + else: + return s == o + + tmp = dummy.__class__() + + return s.xreplace({dummy: tmp}) == o.xreplace({symbol: tmp}) + + @overload + def atoms(self) -> set[Basic]: ... + @overload + def atoms(self, *types: Tbasic | type[Tbasic]) -> set[Tbasic]: ... + + def atoms(self, *types: Tbasic | type[Tbasic]) -> set[Basic] | set[Tbasic]: + """Returns the atoms that form the current object. + + By default, only objects that are truly atomic and cannot + be divided into smaller pieces are returned: symbols, numbers, + and number symbols like I and pi. It is possible to request + atoms of any type, however, as demonstrated below. + + Examples + ======== + + >>> from sympy import I, pi, sin + >>> from sympy.abc import x, y + >>> (1 + x + 2*sin(y + I*pi)).atoms() + {1, 2, I, pi, x, y} + + If one or more types are given, the results will contain only + those types of atoms. + + >>> from sympy import Number, NumberSymbol, Symbol + >>> (1 + x + 2*sin(y + I*pi)).atoms(Symbol) + {x, y} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number) + {1, 2} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol) + {1, 2, pi} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol, I) + {1, 2, I, pi} + + Note that I (imaginary unit) and zoo (complex infinity) are special + types of number symbols and are not part of the NumberSymbol class. + + The type can be given implicitly, too: + + >>> (1 + x + 2*sin(y + I*pi)).atoms(x) # x is a Symbol + {x, y} + + Be careful to check your assumptions when using the implicit option + since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type + of SymPy atom, while ``type(S(2))`` is type ``Integer`` and will find all + integers in an expression: + + >>> from sympy import S + >>> (1 + x + 2*sin(y + I*pi)).atoms(S(1)) + {1} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(S(2)) + {1, 2} + + Finally, arguments to atoms() can select more than atomic atoms: any + SymPy type (loaded in core/__init__.py) can be listed as an argument + and those types of "atoms" as found in scanning the arguments of the + expression recursively: + + >>> from sympy import Function, Mul + >>> from sympy.core.function import AppliedUndef + >>> f = Function('f') + >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(Function) + {f(x), sin(y + I*pi)} + >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(AppliedUndef) + {f(x)} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Mul) + {I*pi, 2*sin(y + I*pi)} + + """ + nodes = _preorder_traversal(self) + if types: + types2 = tuple([t if isinstance(t, type) else type(t) for t in types]) + return {node for node in nodes if isinstance(node, types2)} + else: + return {node for node in nodes if not node.args} + + @property + def free_symbols(self) -> set[Basic]: + """Return from the atoms of self those which are free symbols. + + Not all free symbols are ``Symbol`` (see examples) + + For most expressions, all symbols are free symbols. For some classes + this is not true. e.g. Integrals use Symbols for the dummy variables + which are bound variables, so Integral has a method to return all + symbols except those. Derivative keeps track of symbols with respect + to which it will perform a derivative; those are + bound variables, too, so it has its own free_symbols method. + + Any other method that uses bound variables should implement a + free_symbols method. + + Examples + ======== + + >>> from sympy import Derivative, Integral, IndexedBase + >>> from sympy.abc import x, y, n + >>> (x + 1).free_symbols + {x} + >>> Integral(x, y).free_symbols + {x, y} + + Not all free symbols are actually symbols: + + >>> IndexedBase('F')[0].free_symbols + {F, F[0]} + + The symbols of differentiation are not included unless they + appear in the expression being differentiated. + + >>> Derivative(x + y, y).free_symbols + {x, y} + >>> Derivative(x, y).free_symbols + {x} + >>> Derivative(x, (y, n)).free_symbols + {n, x} + + If you want to know if a symbol is in the variables of the + Derivative you can do so as follows: + + >>> Derivative(x, y).has_free(y) + True + """ + empty: set[Basic] = set() + return empty.union(*(a.free_symbols for a in self.args)) + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return set() + + def as_dummy(self) -> "Self": + """Return the expression with any objects having structurally + bound symbols replaced with unique, canonical symbols within + the object in which they appear and having only the default + assumption for commutativity being True. When applied to a + symbol a new symbol having only the same commutativity will be + returned. + + Examples + ======== + + >>> from sympy import Integral, Symbol + >>> from sympy.abc import x + >>> r = Symbol('r', real=True) + >>> Integral(r, (r, x)).as_dummy() + Integral(_0, (_0, x)) + >>> _.variables[0].is_real is None + True + >>> r.as_dummy() + _r + + Notes + ===== + + Any object that has structurally bound variables should have + a property, ``bound_symbols`` that returns those symbols + appearing in the object. + """ + from .symbol import Dummy, Symbol + def can(x): + # mask free that shadow bound + free = x.free_symbols + bound = set(x.bound_symbols) + d = {i: Dummy() for i in bound & free} + x = x.subs(d) + # replace bound with canonical names + x = x.xreplace(x.canonical_variables) + # return after undoing masking + return x.xreplace({v: k for k, v in d.items()}) + if not self.has(Symbol): + return self + return self.replace( + lambda x: hasattr(x, 'bound_symbols'), + can, + simultaneous=False) # type:ignore + + @property + def canonical_variables(self) -> dict[Basic, Symbol]: + """Return a dictionary mapping any variable defined in + ``self.bound_symbols`` to Symbols that do not clash + with any free symbols in the expression. + + Examples + ======== + + >>> from sympy import Lambda + >>> from sympy.abc import x + >>> Lambda(x, 2*x).canonical_variables + {x: _0} + """ + bound: list[Basic] | None = getattr(self, 'bound_symbols', None) + if bound is None: + return {} + dums = numbered_symbols('_') + reps = {} + # watch out for free symbol that are not in bound symbols; + # those that are in bound symbols are about to get changed + + # XXX: free_symbols only returns particular kinds of expressions that + # generally have a .name attribute. There is not a proper class/type + # that represents this. + names = {i.name for i in self.free_symbols - set(bound)} # type: ignore + for b in bound: + d = next(dums) + if b.is_Symbol: + while d.name in names: + d = next(dums) + reps[b] = d + return reps + + def rcall(self, *args): + """Apply on the argument recursively through the expression tree. + + This method is used to simulate a common abuse of notation for + operators. For instance, in SymPy the following will not work: + + ``(x+Lambda(y, 2*y))(z) == x+2*z``, + + however, you can use: + + >>> from sympy import Lambda + >>> from sympy.abc import x, y, z + >>> (x + Lambda(y, 2*y)).rcall(z) + x + 2*z + """ + if callable(self): + return self(*args) + elif self.args: + newargs = [sub.rcall(*args) for sub in self.args] + return self.func(*newargs) + else: + return self + + def is_hypergeometric(self, k): + from sympy.simplify.simplify import hypersimp + from sympy.functions.elementary.piecewise import Piecewise + if self.has(Piecewise): + return None + return hypersimp(self, k) is not None + + @property + def is_comparable(self): + """Return True if self can be computed to a real number + (or already is a real number) with precision, else False. + + Examples + ======== + + >>> from sympy import exp_polar, pi, I + >>> (I*exp_polar(I*pi/2)).is_comparable + True + >>> (I*exp_polar(I*pi*2)).is_comparable + False + + A False result does not mean that `self` cannot be rewritten + into a form that would be comparable. For example, the + difference computed below is zero but without simplification + it does not evaluate to a zero with precision: + + >>> e = 2**pi*(1 + 2**pi) + >>> dif = e - e.expand() + >>> dif.is_comparable + False + >>> dif.n(2)._prec + 1 + + """ + return self._eval_is_comparable() + + def _eval_is_comparable(self) -> bool: + # Expr.is_comparable overrides this + return False + + @property + def func(self): + """ + The top-level function in an expression. + + The following should hold for all objects:: + + >> x == x.func(*x.args) + + Examples + ======== + + >>> from sympy.abc import x + >>> a = 2*x + >>> a.func + + >>> a.args + (2, x) + >>> a.func(*a.args) + 2*x + >>> a == a.func(*a.args) + True + + """ + return self.__class__ + + @property + def args(self) -> tuple[Basic, ...]: + """Returns a tuple of arguments of 'self'. + + Examples + ======== + + >>> from sympy import cot + >>> from sympy.abc import x, y + + >>> cot(x).args + (x,) + + >>> cot(x).args[0] + x + + >>> (x*y).args + (x, y) + + >>> (x*y).args[1] + y + + Notes + ===== + + Never use self._args, always use self.args. + Only use _args in __new__ when creating a new function. + Do not override .args() from Basic (so that it is easy to + change the interface in the future if needed). + """ + return self._args + + @property + def _sorted_args(self): + """ + The same as ``args``. Derived classes which do not fix an + order on their arguments should override this method to + produce the sorted representation. + """ + return self.args + + def as_content_primitive(self, radical=False, clear=True): + """A stub to allow Basic args (like Tuple) to be skipped when computing + the content and primitive components of an expression. + + See Also + ======== + + sympy.core.expr.Expr.as_content_primitive + """ + return S.One, self + + @overload + def subs(self, arg1: Mapping[Basic | complex, Basic | complex], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Basic | complex]], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Basic | complex, arg2: Basic | complex, **kwargs: Any) -> Basic: ... + + def subs(self, arg1: Mapping[Basic | complex, Basic | complex] + | Iterable[tuple[Basic | complex, Basic | complex]] | Basic | complex, + arg2: Basic | complex | None = None, **kwargs: Any) -> Basic: + """ + Substitutes old for new in an expression after sympifying args. + + `args` is either: + - two arguments, e.g. foo.subs(old, new) + - one iterable argument, e.g. foo.subs(iterable). The iterable may be + o an iterable container with (old, new) pairs. In this case the + replacements are processed in the order given with successive + patterns possibly affecting replacements already made. + o a dict or set whose key/value items correspond to old/new pairs. + In this case the old/new pairs will be sorted by op count and in + case of a tie, by number of args and the default_sort_key. The + resulting sorted list is then processed as an iterable container + (see previous). + + If the keyword ``simultaneous`` is True, the subexpressions will not be + evaluated until all the substitutions have been made. + + Examples + ======== + + >>> from sympy import pi, exp, limit, oo + >>> from sympy.abc import x, y + >>> (1 + x*y).subs(x, pi) + pi*y + 1 + >>> (1 + x*y).subs({x:pi, y:2}) + 1 + 2*pi + >>> (1 + x*y).subs([(x, pi), (y, 2)]) + 1 + 2*pi + >>> reps = [(y, x**2), (x, 2)] + >>> (x + y).subs(reps) + 6 + >>> (x + y).subs(reversed(reps)) + x**2 + 2 + + >>> (x**2 + x**4).subs(x**2, y) + y**2 + y + + To replace only the x**2 but not the x**4, use xreplace: + + >>> (x**2 + x**4).xreplace({x**2: y}) + x**4 + y + + To delay evaluation until all substitutions have been made, + set the keyword ``simultaneous`` to True: + + >>> (x/y).subs([(x, 0), (y, 0)]) + 0 + >>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True) + nan + + This has the added feature of not allowing subsequent substitutions + to affect those already made: + + >>> ((x + y)/y).subs({x + y: y, y: x + y}) + 1 + >>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True) + y/(x + y) + + In order to obtain a canonical result, unordered iterables are + sorted by count_op length, number of arguments and by the + default_sort_key to break any ties. All other iterables are left + unsorted. + + >>> from sympy import sqrt, sin, cos + >>> from sympy.abc import a, b, c, d, e + + >>> A = (sqrt(sin(2*x)), a) + >>> B = (sin(2*x), b) + >>> C = (cos(2*x), c) + >>> D = (x, d) + >>> E = (exp(x), e) + + >>> expr = sqrt(sin(2*x))*sin(exp(x)*x)*cos(2*x) + sin(2*x) + + >>> expr.subs(dict([A, B, C, D, E])) + a*c*sin(d*e) + b + + The resulting expression represents a literal replacement of the + old arguments with the new arguments. This may not reflect the + limiting behavior of the expression: + + >>> (x**3 - 3*x).subs({x: oo}) + nan + + >>> limit(x**3 - 3*x, x, oo) + oo + + If the substitution will be followed by numerical + evaluation, it is better to pass the substitution to + evalf as + + >>> (1/x).evalf(subs={x: 3.0}, n=21) + 0.333333333333333333333 + + rather than + + >>> (1/x).subs({x: 3.0}).evalf(21) + 0.333333333333333314830 + + as the former will ensure that the desired level of precision is + obtained. + + See Also + ======== + replace: replacement capable of doing wildcard-like matching, + parsing of match, and conditional replacements + xreplace: exact node replacement in expr tree; also capable of + using matching rules + sympy.core.evalf.EvalfMixin.evalf: calculates the given formula to a desired level of precision + + """ + from .containers import Dict + from .symbol import Dummy, Symbol + from .numbers import _illegal + + items: Iterable[tuple[Basic | complex, Basic | complex]] + + unordered = False + if arg2 is None: + + if isinstance(arg1, set): + items = arg1 + unordered = True + elif isinstance(arg1, (Dict, Mapping)): + unordered = True + items = arg1.items() # type: ignore + elif not iterable(arg1): + raise ValueError(filldedent(""" + When a single argument is passed to subs + it should be a dictionary of old: new pairs or an iterable + of (old, new) tuples.""")) + else: + items = arg1 # type: ignore + else: + items = [(arg1, arg2)] # type: ignore + + def sympify_old(old) -> Basic: + if isinstance(old, str): + # Use Symbol rather than parse_expr for old + return Symbol(old) + elif isinstance(old, type): + # Allow a type e.g. Function('f') or sin + return sympify(old, strict=False) + else: + return sympify(old, strict=True) + + def sympify_new(new) -> Basic: + if isinstance(new, (str, type)): + # Allow a type or parse a string input + return sympify(new, strict=False) + else: + return sympify(new, strict=True) + + sequence = [(sympify_old(s1), sympify_new(s2)) for s1, s2 in items] + + # skip if there is no change + sequence = [(s1, s2) for s1, s2 in sequence if not _aresame(s1, s2)] + + simultaneous = kwargs.pop('simultaneous', False) + + if unordered: + from .sorting import _nodes, default_sort_key + sequence_dict = dict(sequence) + # order so more complex items are first and items + # of identical complexity are ordered so + # f(x) < f(y) < x < y + # \___ 2 __/ \_1_/ <- number of nodes + # + # For more complex ordering use an unordered sequence. + k = list(ordered(sequence_dict, default=False, keys=( + lambda x: -_nodes(x), + default_sort_key, + ))) + sequence = [(k, sequence_dict[k]) for k in k] + # do infinities first + if not simultaneous: + redo = [i for i, seq in enumerate(sequence) if seq[1] in _illegal] + for i in reversed(redo): + sequence.insert(0, sequence.pop(i)) + + if simultaneous: # XXX should this be the default for dict subs? + reps = {} + rv = self + kwargs['hack2'] = True + m = Dummy('subs_m') + for old, new in sequence: + com = new.is_commutative + if com is None: + com = True + d = Dummy('subs_d', commutative=com) + # using d*m so Subs will be used on dummy variables + # in things like Derivative(f(x, y), x) in which x + # is both free and bound + rv = rv._subs(old, d*m, **kwargs) + if not isinstance(rv, Basic): + break + reps[d] = new + reps[m] = S.One # get rid of m + return rv.xreplace(reps) + else: + rv = self + for old, new in sequence: + rv = rv._subs(old, new, **kwargs) + if not isinstance(rv, Basic): + break + return rv + + @cacheit + def _subs(self, old, new, **hints): + """Substitutes an expression old -> new. + + If self is not equal to old then _eval_subs is called. + If _eval_subs does not want to make any special replacement + then a None is received which indicates that the fallback + should be applied wherein a search for replacements is made + amongst the arguments of self. + + >>> from sympy import Add + >>> from sympy.abc import x, y, z + + Examples + ======== + + Add's _eval_subs knows how to target x + y in the following + so it makes the change: + + >>> (x + y + z).subs(x + y, 1) + z + 1 + + Add's _eval_subs does not need to know how to find x + y in + the following: + + >>> Add._eval_subs(z*(x + y) + 3, x + y, 1) is None + True + + The returned None will cause the fallback routine to traverse the args and + pass the z*(x + y) arg to Mul where the change will take place and the + substitution will succeed: + + >>> (z*(x + y) + 3).subs(x + y, 1) + z + 3 + + ** Developers Notes ** + + An _eval_subs routine for a class should be written if: + + 1) any arguments are not instances of Basic (e.g. bool, tuple); + + 2) some arguments should not be targeted (as in integration + variables); + + 3) if there is something other than a literal replacement + that should be attempted (as in Piecewise where the condition + may be updated without doing a replacement). + + If it is overridden, here are some special cases that might arise: + + 1) If it turns out that no special change was made and all + the original sub-arguments should be checked for + replacements then None should be returned. + + 2) If it is necessary to do substitutions on a portion of + the expression then _subs should be called. _subs will + handle the case of any sub-expression being equal to old + (which usually would not be the case) while its fallback + will handle the recursion into the sub-arguments. For + example, after Add's _eval_subs removes some matching terms + it must process the remaining terms so it calls _subs + on each of the un-matched terms and then adds them + onto the terms previously obtained. + + 3) If the initial expression should remain unchanged then + the original expression should be returned. (Whenever an + expression is returned, modified or not, no further + substitution of old -> new is attempted.) Sum's _eval_subs + routine uses this strategy when a substitution is attempted + on any of its summation variables. + """ + + def fallback(self, old, new): + """ + Try to replace old with new in any of self's arguments. + """ + hit = False + args = list(self.args) + for i, arg in enumerate(args): + if not hasattr(arg, '_eval_subs'): + continue + arg = arg._subs(old, new, **hints) + if not _aresame(arg, args[i]): + hit = True + args[i] = arg + if hit: + rv = self.func(*args) + hack2 = hints.get('hack2', False) + if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack + coeff = S.One + nonnumber = [] + for i in args: + if i.is_Number: + coeff *= i + else: + nonnumber.append(i) + nonnumber = self.func(*nonnumber) + if coeff is S.One: + return nonnumber + else: + return self.func(coeff, nonnumber, evaluate=False) + return rv + return self + + if _aresame(self, old): + return new + + rv = self._eval_subs(old, new) + if rv is None: + rv = fallback(self, old, new) + return rv + + def _eval_subs(self, old, new) -> Basic | None: + """Override this stub if you want to do anything more than + attempt a replacement of old with new in the arguments of self. + + See also + ======== + + _subs + """ + return None + + def xreplace(self, rule): + """ + Replace occurrences of objects within the expression. + + Parameters + ========== + + rule : dict-like + Expresses a replacement rule + + Returns + ======= + + xreplace : the result of the replacement + + Examples + ======== + + >>> from sympy import symbols, pi, exp + >>> x, y, z = symbols('x y z') + >>> (1 + x*y).xreplace({x: pi}) + pi*y + 1 + >>> (1 + x*y).xreplace({x: pi, y: 2}) + 1 + 2*pi + + Replacements occur only if an entire node in the expression tree is + matched: + + >>> (x*y + z).xreplace({x*y: pi}) + z + pi + >>> (x*y*z).xreplace({x*y: pi}) + x*y*z + >>> (2*x).xreplace({2*x: y, x: z}) + y + >>> (2*2*x).xreplace({2*x: y, x: z}) + 4*z + >>> (x + y + 2).xreplace({x + y: 2}) + x + y + 2 + >>> (x + 2 + exp(x + 2)).xreplace({x + 2: y}) + x + exp(y) + 2 + + xreplace does not differentiate between free and bound symbols. In the + following, subs(x, y) would not change x since it is a bound symbol, + but xreplace does: + + >>> from sympy import Integral + >>> Integral(x, (x, 1, 2*x)).xreplace({x: y}) + Integral(y, (y, 1, 2*y)) + + Trying to replace x with an expression raises an error: + + >>> Integral(x, (x, 1, 2*x)).xreplace({x: 2*y}) # doctest: +SKIP + ValueError: Invalid limits given: ((2*y, 1, 4*y),) + + See Also + ======== + replace: replacement capable of doing wildcard-like matching, + parsing of match, and conditional replacements + subs: substitution of subexpressions as defined by the objects + themselves. + + """ + value, _ = self._xreplace(rule) + return value + + def _xreplace(self, rule): + """ + Helper for xreplace. Tracks whether a replacement actually occurred. + """ + if self in rule: + return rule[self], True + elif rule: + args = [] + changed = False + for a in self.args: + _xreplace = getattr(a, '_xreplace', None) + if _xreplace is not None: + a_xr = _xreplace(rule) + args.append(a_xr[0]) + changed |= a_xr[1] + else: + args.append(a) + args = tuple(args) + if changed: + return self.func(*args), True + return self, False + + @cacheit + def has(self, *patterns): + """ + Test whether any subexpression matches any of the patterns. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x, y, z + >>> (x**2 + sin(x*y)).has(z) + False + >>> (x**2 + sin(x*y)).has(x, y, z) + True + >>> x.has(x) + True + + Note ``has`` is a structural algorithm with no knowledge of + mathematics. Consider the following half-open interval: + + >>> from sympy import Interval + >>> i = Interval.Lopen(0, 5); i + Interval.Lopen(0, 5) + >>> i.args + (0, 5, True, False) + >>> i.has(4) # there is no "4" in the arguments + False + >>> i.has(0) # there *is* a "0" in the arguments + True + + Instead, use ``contains`` to determine whether a number is in the + interval or not: + + >>> i.contains(4) + True + >>> i.contains(0) + False + + + Note that ``expr.has(*patterns)`` is exactly equivalent to + ``any(expr.has(p) for p in patterns)``. In particular, ``False`` is + returned when the list of patterns is empty. + + >>> x.has() + False + + """ + return self._has(iterargs, *patterns) + + def has_xfree(self, s: set[Basic]): + """Return True if self has any of the patterns in s as a + free argument, else False. This is like `Basic.has_free` + but this will only report exact argument matches. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> f(x).has_xfree({f}) + False + >>> f(x).has_xfree({f(x)}) + True + >>> f(x + 1).has_xfree({x}) + True + >>> f(x + 1).has_xfree({x + 1}) + True + >>> f(x + y + 1).has_xfree({x + 1}) + False + """ + # protect O(1) containment check by requiring: + if type(s) is not set: + raise TypeError('expecting set argument') + return any(a in s for a in iterfreeargs(self)) + + @cacheit + def has_free(self, *patterns): + """Return True if self has object(s) ``x`` as a free expression + else False. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> g = Function('g') + >>> expr = Integral(f(x), (f(x), 1, g(y))) + >>> expr.free_symbols + {y} + >>> expr.has_free(g(y)) + True + >>> expr.has_free(*(x, f(x))) + False + + This works for subexpressions and types, too: + + >>> expr.has_free(g) + True + >>> (x + y + 1).has_free(y + 1) + True + """ + if not patterns: + return False + p0 = patterns[0] + if len(patterns) == 1 and iterable(p0) and not isinstance(p0, Basic): + # Basic can contain iterables (though not non-Basic, ideally) + # but don't encourage mixed passing patterns + raise TypeError(filldedent(''' + Expecting 1 or more Basic args, not a single + non-Basic iterable. Don't forget to unpack + iterables: `eq.has_free(*patterns)`''')) + # try quick test first + s = set(patterns) + rv = self.has_xfree(s) + if rv: + return rv + # now try matching through slower _has + return self._has(iterfreeargs, *patterns) + + def _has(self, iterargs, *patterns): + # separate out types and unhashable objects + type_set = set() # only types + p_set = set() # hashable non-types + for p in patterns: + if isinstance(p, type) and issubclass(p, Basic): + type_set.add(p) + continue + if not isinstance(p, Basic): + try: + p = _sympify(p) + except SympifyError: + continue # Basic won't have this in it + p_set.add(p) # fails if object defines __eq__ but + # doesn't define __hash__ + types = tuple(type_set) # + for i in iterargs(self): # + if i in p_set: # <--- here, too + return True + if isinstance(i, types): + return True + + # use matcher if defined, e.g. operations defines + # matcher that checks for exact subset containment, + # (x + y + 1).has(x + 1) -> True + for i in p_set - type_set: # types don't have matchers + if not hasattr(i, '_has_matcher'): + continue + match = i._has_matcher() + if any(match(arg) for arg in iterargs(self)): + return True + + # no success + return False + + def replace(self, query, value, map=False, simultaneous=True, exact=None) -> Basic: + """ + Replace matching subexpressions of ``self`` with ``value``. + + If ``map = True`` then also return the mapping {old: new} where ``old`` + was a sub-expression found with query and ``new`` is the replacement + value for it. If the expression itself does not match the query, then + the returned value will be ``self.xreplace(map)`` otherwise it should + be ``self.subs(ordered(map.items()))``. + + Traverses an expression tree and performs replacement of matching + subexpressions from the bottom to the top of the tree. The default + approach is to do the replacement in a simultaneous fashion so + changes made are targeted only once. If this is not desired or causes + problems, ``simultaneous`` can be set to False. + + In addition, if an expression containing more than one Wild symbol + is being used to match subexpressions and the ``exact`` flag is None + it will be set to True so the match will only succeed if all non-zero + values are received for each Wild that appears in the match pattern. + Setting this to False accepts a match of 0; while setting it True + accepts all matches that have a 0 in them. See example below for + cautions. + + The list of possible combinations of queries and replacement values + is listed below: + + Examples + ======== + + Initial setup + + >>> from sympy import log, sin, cos, tan, Wild, Mul, Add + >>> from sympy.abc import x, y + >>> f = log(sin(x)) + tan(sin(x**2)) + + 1.1. type -> type + obj.replace(type, newtype) + + When object of type ``type`` is found, replace it with the + result of passing its argument(s) to ``newtype``. + + >>> f.replace(sin, cos) + log(cos(x)) + tan(cos(x**2)) + >>> sin(x).replace(sin, cos, map=True) + (cos(x), {sin(x): cos(x)}) + >>> (x*y).replace(Mul, Add) + x + y + + 1.2. type -> func + obj.replace(type, func) + + When object of type ``type`` is found, apply ``func`` to its + argument(s). ``func`` must be written to handle the number + of arguments of ``type``. + + >>> f.replace(sin, lambda arg: sin(2*arg)) + log(sin(2*x)) + tan(sin(2*x**2)) + >>> (x*y).replace(Mul, lambda *args: sin(2*Mul(*args))) + sin(2*x*y) + + 2.1. pattern -> expr + obj.replace(pattern(wild), expr(wild)) + + Replace subexpressions matching ``pattern`` with the expression + written in terms of the Wild symbols in ``pattern``. + + >>> a, b = map(Wild, 'ab') + >>> f.replace(sin(a), tan(a)) + log(tan(x)) + tan(tan(x**2)) + >>> f.replace(sin(a), tan(a/2)) + log(tan(x/2)) + tan(tan(x**2/2)) + >>> f.replace(sin(a), a) + log(x) + tan(x**2) + >>> (x*y).replace(a*x, a) + y + + Matching is exact by default when more than one Wild symbol + is used: matching fails unless the match gives non-zero + values for all Wild symbols: + + >>> (2*x + y).replace(a*x + b, b - a) + y - 2 + >>> (2*x).replace(a*x + b, b - a) + 2*x + + When set to False, the results may be non-intuitive: + + >>> (2*x).replace(a*x + b, b - a, exact=False) + 2/x + + 2.2. pattern -> func + obj.replace(pattern(wild), lambda wild: expr(wild)) + + All behavior is the same as in 2.1 but now a function in terms of + pattern variables is used rather than an expression: + + >>> f.replace(sin(a), lambda a: sin(2*a)) + log(sin(2*x)) + tan(sin(2*x**2)) + + 3.1. func -> func + obj.replace(filter, func) + + Replace subexpression ``e`` with ``func(e)`` if ``filter(e)`` + is True. + + >>> g = 2*sin(x**3) + >>> g.replace(lambda expr: expr.is_Number, lambda expr: expr**2) + 4*sin(x**9) + + The expression itself is also targeted by the query but is done in + such a fashion that changes are not made twice. + + >>> e = x*(x*y + 1) + >>> e.replace(lambda x: x.is_Mul, lambda x: 2*x) + 2*x*(2*x*y + 1) + + When matching a single symbol, `exact` will default to True, but + this may or may not be the behavior that is desired: + + Here, we want `exact=False`: + + >>> from sympy import Function + >>> f = Function('f') + >>> e = f(1) + f(0) + >>> q = f(a), lambda a: f(a + 1) + >>> e.replace(*q, exact=False) + f(1) + f(2) + >>> e.replace(*q, exact=True) + f(0) + f(2) + + But here, the nature of matching makes selecting + the right setting tricky: + + >>> e = x**(1 + y) + >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=False) + x + >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=True) + x**(-x - y + 1) + >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=False) + x + >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=True) + x**(1 - y) + + It is probably better to use a different form of the query + that describes the target expression more precisely: + + >>> (1 + x**(1 + y)).replace( + ... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1, + ... lambda x: x.base**(1 - (x.exp - 1))) + ... + x**(1 - y) + 1 + + See Also + ======== + + subs: substitution of subexpressions as defined by the objects + themselves. + xreplace: exact node replacement in expr tree; also capable of + using matching rules + + """ + + try: + query = _sympify(query) + except SympifyError: + pass + try: + value = _sympify(value) + except SympifyError: + pass + if isinstance(query, type): + _query = lambda expr: isinstance(expr, query) + + if isinstance(value, type): + _value = lambda expr, result: value(*expr.args) + elif callable(value): + _value = lambda expr, result: value(*expr.args) + else: + raise TypeError( + "given a type, replace() expects another " + "type or a callable") + elif isinstance(query, Basic): + _query = lambda expr: expr.match(query) + if exact is None: + from .symbol import Wild + exact = (len(query.atoms(Wild)) > 1) + + if isinstance(value, Basic): + if exact: + _value = lambda expr, result: (value.subs(result) + if all(result.values()) else expr) + else: + _value = lambda expr, result: value.subs(result) + elif callable(value): + # match dictionary keys get the trailing underscore stripped + # from them and are then passed as keywords to the callable; + # if ``exact`` is True, only accept match if there are no null + # values amongst those matched. + if exact: + _value = lambda expr, result: (value(** + {str(k)[:-1]: v for k, v in result.items()}) + if all(val for val in result.values()) else expr) + else: + _value = lambda expr, result: value(** + {str(k)[:-1]: v for k, v in result.items()}) + else: + raise TypeError( + "given an expression, replace() expects " + "another expression or a callable") + elif callable(query): + _query = query + + if callable(value): + _value = lambda expr, result: value(expr) + else: + raise TypeError( + "given a callable, replace() expects " + "another callable") + else: + raise TypeError( + "first argument to replace() must be a " + "type, an expression or a callable") + + def walk(rv, F): + """Apply ``F`` to args and then to result. + """ + args = getattr(rv, 'args', None) + if args is not None: + if args: + newargs = tuple([walk(a, F) for a in args]) + if args != newargs: + rv = rv.func(*newargs) + if simultaneous: + # if rv is something that was already + # matched (that was changed) then skip + # applying F again + for i, e in enumerate(args): + if rv == e and e != newargs[i]: + return rv + rv = F(rv) + return rv + + mapping = {} # changes that took place + + def rec_replace(expr): + result = _query(expr) + if result or result == {}: + v = _value(expr, result) + if v is not None and v != expr: + if map: + mapping[expr] = v + expr = v + return expr + + rv = walk(self, rec_replace) + return (rv, mapping) if map else rv # type: ignore + + def find(self, query, group=False): + """Find all subexpressions matching a query.""" + query = _make_find_query(query) + results = list(filter(query, _preorder_traversal(self))) + + if not group: + return set(results) + return dict(Counter(results)) + + def count(self, query): + """Count the number of matching subexpressions.""" + query = _make_find_query(query) + return sum(bool(query(sub)) for sub in _preorder_traversal(self)) + + def matches(self, expr, repl_dict=None, old=False): + """ + Helper method for match() that looks for a match between Wild symbols + in self and expressions in expr. + + Examples + ======== + + >>> from sympy import symbols, Wild, Basic + >>> a, b, c = symbols('a b c') + >>> x = Wild('x') + >>> Basic(a + x, x).matches(Basic(a + b, c)) is None + True + >>> Basic(a + x, x).matches(Basic(a + b + c, b + c)) + {x_: b + c} + """ + expr = sympify(expr) + if not isinstance(expr, self.__class__): + return None + + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + if self == expr: + return repl_dict + + if len(self.args) != len(expr.args): + return None + + d = repl_dict # already a copy + for arg, other_arg in zip(self.args, expr.args): + if arg == other_arg: + continue + if arg.is_Relational: + try: + d = arg.xreplace(d).matches(other_arg, d, old=old) + except TypeError: # Should be InvalidComparisonError when introduced + d = None + else: + d = arg.xreplace(d).matches(other_arg, d, old=old) + if d is None: + return None + return d + + def match(self, pattern, old=False): + """ + Pattern matching. + + Wild symbols match all. + + Return ``None`` when expression (self) does not match with pattern. + Otherwise return a dictionary such that:: + + pattern.xreplace(self.match(pattern)) == self + + Examples + ======== + + >>> from sympy import Wild, Sum + >>> from sympy.abc import x, y + >>> p = Wild("p") + >>> q = Wild("q") + >>> r = Wild("r") + >>> e = (x+y)**(x+y) + >>> e.match(p**p) + {p_: x + y} + >>> e.match(p**q) + {p_: x + y, q_: x + y} + >>> e = (2*x)**2 + >>> e.match(p*q**r) + {p_: 4, q_: x, r_: 2} + >>> (p*q**r).xreplace(e.match(p*q**r)) + 4*x**2 + + Since match is purely structural expressions that are equivalent up to + bound symbols will not match: + + >>> print(Sum(x, (x, 1, 2)).match(Sum(y, (y, 1, p)))) + None + + An expression with bound symbols can be matched if the pattern uses + a distinct ``Wild`` for each bound symbol: + + >>> Sum(x, (x, 1, 2)).match(Sum(q, (q, 1, p))) + {p_: 2, q_: x} + + The ``old`` flag will give the old-style pattern matching where + expressions and patterns are essentially solved to give the match. Both + of the following give None unless ``old=True``: + + >>> (x - 2).match(p - x, old=True) + {p_: 2*x - 2} + >>> (2/x).match(p*x, old=True) + {p_: 2/x**2} + + See Also + ======== + + matches: pattern.matches(expr) is the same as expr.match(pattern) + xreplace: exact structural replacement + replace: structural replacement with pattern matching + Wild: symbolic placeholders for expressions in pattern matching + """ + pattern = sympify(pattern) + return pattern.matches(self, old=old) + + def count_ops(self, visual=False): + """Wrapper for count_ops that returns the operation count.""" + from .function import count_ops + return count_ops(self, visual) + + def doit(self, **hints): + """Evaluate objects that are not evaluated by default like limits, + integrals, sums and products. All objects of this kind will be + evaluated recursively, unless some species were excluded via 'hints' + or unless the 'deep' hint was set to 'False'. + + >>> from sympy import Integral + >>> from sympy.abc import x + + >>> 2*Integral(x, x) + 2*Integral(x, x) + + >>> (2*Integral(x, x)).doit() + x**2 + + >>> (2*Integral(x, x)).doit(deep=False) + 2*Integral(x, x) + + """ + if hints.get('deep', True): + terms = [term.doit(**hints) if isinstance(term, Basic) else term + for term in self.args] + return self.func(*terms) + else: + return self + + def simplify(self, **kwargs) -> Basic: + """See the simplify function in sympy.simplify""" + from sympy.simplify.simplify import simplify + return simplify(self, **kwargs) + + def refine(self, assumption=True): + """See the refine function in sympy.assumptions""" + from sympy.assumptions.refine import refine + return refine(self, assumption) + + def _eval_derivative_n_times(self, s, n): + # This is the default evaluator for derivatives (as called by `diff` + # and `Derivative`), it will attempt a loop to derive the expression + # `n` times by calling the corresponding `_eval_derivative` method, + # while leaving the derivative unevaluated if `n` is symbolic. This + # method should be overridden if the object has a closed form for its + # symbolic n-th derivative. + from .numbers import Integer + if isinstance(n, (int, Integer)): + obj = self + for i in range(n): + prev = obj + obj = obj._eval_derivative(s) + if obj is None: + return None + elif obj == prev: + break + return obj + else: + return None + + def rewrite(self, *args, deep=True, **hints): + """ + Rewrite *self* using a defined rule. + + Rewriting transforms an expression to another, which is mathematically + equivalent but structurally different. For example you can rewrite + trigonometric functions as complex exponentials or combinatorial + functions as gamma function. + + This method takes a *pattern* and a *rule* as positional arguments. + *pattern* is optional parameter which defines the types of expressions + that will be transformed. If it is not passed, all possible expressions + will be rewritten. *rule* defines how the expression will be rewritten. + + Parameters + ========== + + args : Expr + A *rule*, or *pattern* and *rule*. + - *pattern* is a type or an iterable of types. + - *rule* can be any object. + + deep : bool, optional + If ``True``, subexpressions are recursively transformed. Default is + ``True``. + + Examples + ======== + + If *pattern* is unspecified, all possible expressions are transformed. + + >>> from sympy import cos, sin, exp, I + >>> from sympy.abc import x + >>> expr = cos(x) + I*sin(x) + >>> expr.rewrite(exp) + exp(I*x) + + Pattern can be a type or an iterable of types. + + >>> expr.rewrite(sin, exp) + exp(I*x)/2 + cos(x) - exp(-I*x)/2 + >>> expr.rewrite([cos,], exp) + exp(I*x)/2 + I*sin(x) + exp(-I*x)/2 + >>> expr.rewrite([cos, sin], exp) + exp(I*x) + + Rewriting behavior can be implemented by defining ``_eval_rewrite()`` + method. + + >>> from sympy import Expr, sqrt, pi + >>> class MySin(Expr): + ... def _eval_rewrite(self, rule, args, **hints): + ... x, = args + ... if rule == cos: + ... return cos(pi/2 - x, evaluate=False) + ... if rule == sqrt: + ... return sqrt(1 - cos(x)**2) + >>> MySin(MySin(x)).rewrite(cos) + cos(-cos(-x + pi/2) + pi/2) + >>> MySin(x).rewrite(sqrt) + sqrt(1 - cos(x)**2) + + Defining ``_eval_rewrite_as_[...]()`` method is supported for backwards + compatibility reason. This may be removed in the future and using it is + discouraged. + + >>> class MySin(Expr): + ... def _eval_rewrite_as_cos(self, *args, **hints): + ... x, = args + ... return cos(pi/2 - x, evaluate=False) + >>> MySin(x).rewrite(cos) + cos(-x + pi/2) + + """ + if not args: + return self + + hints.update(deep=deep) + + pattern = args[:-1] + rule = args[-1] + + # Special case: map `abs` to `Abs` + if rule is abs: + from sympy.functions.elementary.complexes import Abs + rule = Abs + + # support old design by _eval_rewrite_as_[...] method + if isinstance(rule, str): + method = "_eval_rewrite_as_%s" % rule + elif hasattr(rule, "__name__"): + # rule is class or function + clsname = rule.__name__ + method = "_eval_rewrite_as_%s" % clsname + else: + # rule is instance + clsname = rule.__class__.__name__ + method = "_eval_rewrite_as_%s" % clsname + + if pattern: + if iterable(pattern[0]): + pattern = pattern[0] + pattern = tuple(p for p in pattern if self.has(p)) + if not pattern: + return self + # hereafter, empty pattern is interpreted as all pattern. + + return self._rewrite(pattern, rule, method, **hints) + + def _rewrite(self, pattern, rule, method, **hints): + deep = hints.pop('deep', True) + if deep: + args = [a._rewrite(pattern, rule, method, **hints) + for a in self.args] + else: + args = self.args + if not pattern or any(isinstance(self, p) for p in pattern): + meth = getattr(self, method, None) + if meth is not None: + rewritten = meth(*args, **hints) + else: + rewritten = self._eval_rewrite(rule, args, **hints) + if rewritten is not None: + return rewritten + if not args: + return self + return self.func(*args) + + def _eval_rewrite(self, rule, args, **hints): + return None + + _constructor_postprocessor_mapping = {} # type: ignore + + @classmethod + def _exec_constructor_postprocessors(cls, obj): + # WARNING: This API is experimental. + + # This is an experimental API that introduces constructor + # postprosessors for SymPy Core elements. If an argument of a SymPy + # expression has a `_constructor_postprocessor_mapping` attribute, it will + # be interpreted as a dictionary containing lists of postprocessing + # functions for matching expression node names. + + clsname = obj.__class__.__name__ + postprocessors = {f for i in obj.args + for f in _get_postprocessors(clsname, type(i))} + for f in postprocessors: + obj = f(obj) + + return obj + + def _sage_(self): + """ + Convert *self* to a symbolic expression of SageMath. + + This version of the method is merely a placeholder. + """ + old_method = self._sage_ + from sage.interfaces.sympy import sympy_init # type: ignore + sympy_init() # may monkey-patch _sage_ method into self's class or superclasses + if old_method == self._sage_: + raise NotImplementedError('conversion to SageMath is not implemented') + else: + # call the freshly monkey-patched method + return self._sage_() + + def could_extract_minus_sign(self) -> bool: + return False # see Expr.could_extract_minus_sign + + def is_same(a, b, approx=None): + """Return True if a and b are structurally the same, else False. + If `approx` is supplied, it will be used to test whether two + numbers are the same or not. By default, only numbers of the + same type will compare equal, so S.Half != Float(0.5). + + Examples + ======== + + In SymPy (unlike Python) two numbers do not compare the same if they are + not of the same type: + + >>> from sympy import S + >>> 2.0 == S(2) + False + >>> 0.5 == S.Half + False + + By supplying a function with which to compare two numbers, such + differences can be ignored. e.g. `equal_valued` will return True + for decimal numbers having a denominator that is a power of 2, + regardless of precision. + + >>> from sympy import Float + >>> from sympy.core.numbers import equal_valued + >>> (S.Half/4).is_same(Float(0.125, 1), equal_valued) + True + >>> Float(1, 2).is_same(Float(1, 10), equal_valued) + True + + But decimals without a power of 2 denominator will compare + as not being the same. + + >>> Float(0.1, 9).is_same(Float(0.1, 10), equal_valued) + False + + But arbitrary differences can be ignored by supplying a function + to test the equivalence of two numbers: + + >>> import math + >>> Float(0.1, 9).is_same(Float(0.1, 10), math.isclose) + True + + Other objects might compare the same even though types are not the + same. This routine will only return True if two expressions are + identical in terms of class types. + + >>> from sympy import eye, Basic + >>> eye(1) == S(eye(1)) # mutable vs immutable + True + >>> Basic.is_same(eye(1), S(eye(1))) + False + + """ + from .numbers import Number + from .traversal import postorder_traversal as pot + for t in zip_longest(pot(a), pot(b)): + if None in t: + return False + a, b = t + if isinstance(a, Number): + if not isinstance(b, Number): + return False + if approx: + return approx(a, b) + if not (a == b and a.__class__ == b.__class__): + return False + return True + +_aresame = Basic.is_same # for sake of others importing this + +# key used by Mul and Add to make canonical args +_args_sortkey = cmp_to_key(Basic.compare) + +# For all Basic subclasses _prepare_class_assumptions is called by +# Basic.__init_subclass__ but that method is not called for Basic itself so we +# call the function here instead. +_prepare_class_assumptions(Basic) + + +class Atom(Basic): + """ + A parent class for atomic things. An atom is an expression with no subexpressions. + + Examples + ======== + + Symbol, Number, Rational, Integer, ... + But not: Add, Mul, Pow, ... + """ + + is_Atom = True + + __slots__ = () + + def matches(self, expr, repl_dict=None, old=False): + if self == expr: + if repl_dict is None: + return {} + return repl_dict.copy() + + def xreplace(self, rule, hack2=False): + return rule.get(self, self) + + def doit(self, **hints): + return self + + @classmethod + def class_key(cls): + return 2, 0, cls.__name__ + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One + + def _eval_simplify(self, **kwargs): + return self + + @property + def _sorted_args(self): + # this is here as a safeguard against accidentally using _sorted_args + # on Atoms -- they cannot be rebuilt as atom.func(*atom._sorted_args) + # since there are no args. So the calling routine should be checking + # to see that this property is not called for Atoms. + raise AttributeError('Atoms have no args. It might be necessary' + ' to make a check for Atoms in the calling code.') + + +def _atomic(e, recursive=False): + """Return atom-like quantities as far as substitution is + concerned: Derivatives, Functions and Symbols. Do not + return any 'atoms' that are inside such quantities unless + they also appear outside, too, unless `recursive` is True. + + Examples + ======== + + >>> from sympy import Derivative, Function, cos + >>> from sympy.abc import x, y + >>> from sympy.core.basic import _atomic + >>> f = Function('f') + >>> _atomic(x + y) + {x, y} + >>> _atomic(x + f(y)) + {x, f(y)} + >>> _atomic(Derivative(f(x), x) + cos(x) + y) + {y, cos(x), Derivative(f(x), x)} + + """ + pot = _preorder_traversal(e) + seen = set() + if isinstance(e, Basic): + free = getattr(e, "free_symbols", None) + if free is None: + return {e} + else: + return set() + from .symbol import Symbol + from .function import Derivative, Function + atoms = set() + for p in pot: + if p in seen: + pot.skip() + continue + seen.add(p) + if isinstance(p, Symbol) and p in free: + atoms.add(p) + elif isinstance(p, (Derivative, Function)): + if not recursive: + pot.skip() + atoms.add(p) + return atoms + + +def _make_find_query(query): + """Convert the argument of Basic.find() into a callable""" + try: + query = _sympify(query) + except SympifyError: + pass + if isinstance(query, type): + return lambda expr: isinstance(expr, query) + elif isinstance(query, Basic): + return lambda expr: expr.match(query) is not None + return query + +# Delayed to avoid cyclic import +from .singleton import S +from .traversal import (preorder_traversal as _preorder_traversal, + iterargs, iterfreeargs) + +preorder_traversal = deprecated( + """ + Using preorder_traversal from the sympy.core.basic submodule is + deprecated. + + Instead, use preorder_traversal from the top-level sympy namespace, like + + sympy.preorder_traversal + """, + deprecated_since_version="1.10", + active_deprecations_target="deprecated-traversal-functions-moved", +)(_preorder_traversal) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py new file mode 100644 index 0000000000000000000000000000000000000000..39860943b763a30cf4f91578dbac37dc7e6e444e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py @@ -0,0 +1,43 @@ +from sympy.core import Add, Mul, symbols + +x, y, z = symbols('x,y,z') + + +def timeit_neg(): + -x + + +def timeit_Add_x1(): + x + 1 + + +def timeit_Add_1x(): + 1 + x + + +def timeit_Add_x05(): + x + 0.5 + + +def timeit_Add_xy(): + x + y + + +def timeit_Add_xyz(): + Add(*[x, y, z]) + + +def timeit_Mul_xy(): + x*y + + +def timeit_Mul_xyz(): + Mul(*[x, y, z]) + + +def timeit_Div_xy(): + x/y + + +def timeit_Div_2y(): + 2/y diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..1a8e47928b76034dd1d7ba8b8f87bd527bb1cdeb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py @@ -0,0 +1,12 @@ +from sympy.core import Symbol, Integer + +x = Symbol('x') +i3 = Integer(3) + + +def timeit_x_is_integer(): + x.is_integer + + +def timeit_Integer_is_irrational(): + i3.is_irrational diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py new file mode 100644 index 0000000000000000000000000000000000000000..df2a382ecbd3cf6eb1f8555577dabb5e07c6643b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py @@ -0,0 +1,15 @@ +from sympy.core import symbols, S + +x, y = symbols('x,y') + + +def timeit_Symbol_meth_lookup(): + x.diff # no call, just method lookup + + +def timeit_S_lookup(): + S.Exp1 + + +def timeit_Symbol_eq_xy(): + x == y diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py new file mode 100644 index 0000000000000000000000000000000000000000..4f5ac513e368cb7e9b542926bc25a5695de6d914 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py @@ -0,0 +1,23 @@ +from sympy.core import symbols, I + +x, y, z = symbols('x,y,z') + +p = 3*x**2*y*z**7 + 7*x*y*z**2 + 4*x + x*y**4 +e = (x + y + z + 1)**32 + + +def timeit_expand_nothing_todo(): + p.expand() + + +def bench_expand_32(): + """(x+y+z+1)**32 -> expand""" + e.expand() + + +def timeit_expand_complex_number_1(): + ((2 + 3*I)**1000).expand(complex=True) + + +def timeit_expand_complex_number_2(): + ((2 + 3*I/4)**1000).expand(complex=True) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..5c7484c389232b3622fb4b6724e4ab8534dde382 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py @@ -0,0 +1,92 @@ +from sympy.core.numbers import Integer, Rational, pi, oo +from sympy.core.intfunc import integer_nthroot, igcd +from sympy.core.singleton import S + +i3 = Integer(3) +i4 = Integer(4) +r34 = Rational(3, 4) +q45 = Rational(4, 5) + + +def timeit_Integer_create(): + Integer(2) + + +def timeit_Integer_int(): + int(i3) + + +def timeit_neg_one(): + -S.One + + +def timeit_Integer_neg(): + -i3 + + +def timeit_Integer_abs(): + abs(i3) + + +def timeit_Integer_sub(): + i3 - i3 + + +def timeit_abs_pi(): + abs(pi) + + +def timeit_neg_oo(): + -oo + + +def timeit_Integer_add_i1(): + i3 + 1 + + +def timeit_Integer_add_ij(): + i3 + i4 + + +def timeit_Integer_add_Rational(): + i3 + r34 + + +def timeit_Integer_mul_i4(): + i3*4 + + +def timeit_Integer_mul_ij(): + i3*i4 + + +def timeit_Integer_mul_Rational(): + i3*r34 + + +def timeit_Integer_eq_i3(): + i3 == 3 + + +def timeit_Integer_ed_Rational(): + i3 == r34 + + +def timeit_integer_nthroot(): + integer_nthroot(100, 2) + + +def timeit_number_igcd_23_17(): + igcd(23, 17) + + +def timeit_number_igcd_60_3600(): + igcd(60, 3600) + + +def timeit_Rational_add_r1(): + r34 + 1 + + +def timeit_Rational_add_rq(): + r34 + q45 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..d8cc0abc1e35439a1a495454abf87769d5b40d04 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py @@ -0,0 +1,11 @@ +from sympy.core import sympify, Symbol + +x = Symbol('x') + + +def timeit_sympify_1(): + sympify(1) + + +def timeit_sympify_x(): + sympify(x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/cache.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/cache.py new file mode 100644 index 0000000000000000000000000000000000000000..ec11600a5e40ad446a6e5dde8820d46ea915b06a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/cache.py @@ -0,0 +1,210 @@ +""" Caching facility for SymPy """ +from importlib import import_module +from typing import Callable + +class _cache(list): + """ List of cached functions """ + + def print_cache(self): + """print cache info""" + + for item in self: + name = item.__name__ + myfunc = item + while hasattr(myfunc, '__wrapped__'): + if hasattr(myfunc, 'cache_info'): + info = myfunc.cache_info() + break + else: + myfunc = myfunc.__wrapped__ + else: + info = None + + print(name, info) + + def clear_cache(self): + """clear cache content""" + for item in self: + myfunc = item + while hasattr(myfunc, '__wrapped__'): + if hasattr(myfunc, 'cache_clear'): + myfunc.cache_clear() + break + else: + myfunc = myfunc.__wrapped__ + + +# global cache registry: +CACHE = _cache() +# make clear and print methods available +print_cache = CACHE.print_cache +clear_cache = CACHE.clear_cache + +from functools import lru_cache, wraps + +def __cacheit(maxsize): + """caching decorator. + + important: the result of cached function must be *immutable* + + + Examples + ======== + + >>> from sympy import cacheit + >>> @cacheit + ... def f(a, b): + ... return a+b + + >>> @cacheit + ... def f(a, b): # noqa: F811 + ... return [a, b] # <-- WRONG, returns mutable object + + to force cacheit to check returned results mutability and consistency, + set environment variable SYMPY_USE_CACHE to 'debug' + """ + def func_wrapper(func): + cfunc = lru_cache(maxsize, typed=True)(func) + + @wraps(func) + def wrapper(*args, **kwargs): + try: + retval = cfunc(*args, **kwargs) + except TypeError as e: + if not e.args or not e.args[0].startswith('unhashable type:'): + raise + retval = func(*args, **kwargs) + return retval + + wrapper.cache_info = cfunc.cache_info + wrapper.cache_clear = cfunc.cache_clear + + CACHE.append(wrapper) + return wrapper + + return func_wrapper +######################################## + + +def __cacheit_nocache(func): + return func + + +def __cacheit_debug(maxsize): + """cacheit + code to check cache consistency""" + def func_wrapper(func): + cfunc = __cacheit(maxsize)(func) + + @wraps(func) + def wrapper(*args, **kw_args): + # always call function itself and compare it with cached version + r1 = func(*args, **kw_args) + r2 = cfunc(*args, **kw_args) + + # try to see if the result is immutable + # + # this works because: + # + # hash([1,2,3]) -> raise TypeError + # hash({'a':1, 'b':2}) -> raise TypeError + # hash((1,[2,3])) -> raise TypeError + # + # hash((1,2,3)) -> just computes the hash + hash(r1), hash(r2) + + # also see if returned values are the same + if r1 != r2: + raise RuntimeError("Returned values are not the same") + return r1 + return wrapper + return func_wrapper + + +def _getenv(key, default=None): + from os import getenv + return getenv(key, default) + +# SYMPY_USE_CACHE=yes/no/debug +USE_CACHE = _getenv('SYMPY_USE_CACHE', 'yes').lower() +# SYMPY_CACHE_SIZE=some_integer/None +# special cases : +# SYMPY_CACHE_SIZE=0 -> No caching +# SYMPY_CACHE_SIZE=None -> Unbounded caching +scs = _getenv('SYMPY_CACHE_SIZE', '1000') +if scs.lower() == 'none': + SYMPY_CACHE_SIZE = None +else: + try: + SYMPY_CACHE_SIZE = int(scs) + except ValueError: + raise RuntimeError( + 'SYMPY_CACHE_SIZE must be a valid integer or None. ' + \ + 'Got: %s' % SYMPY_CACHE_SIZE) + +if USE_CACHE == 'no': + cacheit = __cacheit_nocache +elif USE_CACHE == 'yes': + cacheit = __cacheit(SYMPY_CACHE_SIZE) +elif USE_CACHE == 'debug': + cacheit = __cacheit_debug(SYMPY_CACHE_SIZE) # a lot slower +else: + raise RuntimeError( + 'unrecognized value for SYMPY_USE_CACHE: %s' % USE_CACHE) + + +def cached_property(func): + '''Decorator to cache property method''' + attrname = '__' + func.__name__ + _cached_property_sentinel = object() + def propfunc(self): + val = getattr(self, attrname, _cached_property_sentinel) + if val is _cached_property_sentinel: + val = func(self) + setattr(self, attrname, val) + return val + return property(propfunc) + + +def lazy_function(module : str, name : str) -> Callable: + """Create a lazy proxy for a function in a module. + + The module containing the function is not imported until the function is used. + + """ + func = None + + def _get_function(): + nonlocal func + if func is None: + func = getattr(import_module(module), name) + return func + + # The metaclass is needed so that help() shows the docstring + class LazyFunctionMeta(type): + @property + def __doc__(self): + docstring = _get_function().__doc__ + docstring += f"\n\nNote: this is a {self.__class__.__name__} wrapper of '{module}.{name}'" + return docstring + + class LazyFunction(metaclass=LazyFunctionMeta): + def __call__(self, *args, **kwargs): + # inline get of function for performance gh-23832 + nonlocal func + if func is None: + func = getattr(import_module(module), name) + return func(*args, **kwargs) + + @property + def __doc__(self): + docstring = _get_function().__doc__ + docstring += f"\n\nNote: this is a {self.__class__.__name__} wrapper of '{module}.{name}'" + return docstring + + def __str__(self): + return _get_function().__str__() + + def __repr__(self): + return f"<{__class__.__name__} object at 0x{id(self):x}>: wrapping '{module}.{name}'" + + return LazyFunction() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/compatibility.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/compatibility.py new file mode 100644 index 0000000000000000000000000000000000000000..637a2698dbb39a042d3d664404bb0a4cba7fd004 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/compatibility.py @@ -0,0 +1,35 @@ +""" +.. deprecated:: 1.10 + + ``sympy.core.compatibility`` is deprecated. See + :ref:`sympy-core-compatibility`. + +Reimplementations of constructs introduced in later versions of Python than +we support. Also some functions that are needed SymPy-wide and are located +here for easy import. + +""" + + +from sympy.utilities.exceptions import sympy_deprecation_warning + +sympy_deprecation_warning(""" +The sympy.core.compatibility submodule is deprecated. + +This module was only ever intended for internal use. Some of the functions +that were in this module are available from the top-level SymPy namespace, +i.e., + + from sympy import ordered, default_sort_key + +The remaining were only intended for internal SymPy use and should not be used +by user code. +""", + deprecated_since_version="1.10", + active_deprecations_target="deprecated-sympy-core-compatibility", + ) + + +from .sorting import ordered, _nodes, default_sort_key # noqa:F401 +from sympy.utilities.misc import as_int as _as_int # noqa:F401 +from sympy.utilities.iterables import iterable, is_sequence, NotIterable # noqa:F401 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/containers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/containers.py new file mode 100644 index 0000000000000000000000000000000000000000..35352009e87f3a7809a53031080cefdadb6528be --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/containers.py @@ -0,0 +1,415 @@ +"""Module for SymPy containers + + (SymPy objects that store other SymPy objects) + + The containers implemented in this module are subclassed to Basic. + They are supposed to work seamlessly within the SymPy framework. +""" + +from __future__ import annotations + +from collections import OrderedDict +from collections.abc import MutableSet +from typing import Any, Callable + +from .basic import Basic +from .sorting import default_sort_key, ordered +from .sympify import _sympify, sympify, _sympy_converter, SympifyError +from sympy.core.kind import Kind +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +class Tuple(Basic): + """ + Wrapper around the builtin tuple object. + + Explanation + =========== + + The Tuple is a subclass of Basic, so that it works well in the + SymPy framework. The wrapped tuple is available as self.args, but + you can also access elements or slices with [:] syntax. + + Parameters + ========== + + sympify : bool + If ``False``, ``sympify`` is not called on ``args``. This + can be used for speedups for very large tuples where the + elements are known to already be SymPy objects. + + Examples + ======== + + >>> from sympy import Tuple, symbols + >>> a, b, c, d = symbols('a b c d') + >>> Tuple(a, b, c)[1:] + (b, c) + >>> Tuple(a, b, c).subs(a, d) + (d, b, c) + + """ + + def __new__(cls, *args, **kwargs): + if kwargs.get('sympify', True): + args = (sympify(arg) for arg in args) + obj = Basic.__new__(cls, *args) + return obj + + def __getitem__(self, i): + if isinstance(i, slice): + indices = i.indices(len(self)) + return Tuple(*(self.args[j] for j in range(*indices))) + return self.args[i] + + def __len__(self): + return len(self.args) + + def __contains__(self, item): + return item in self.args + + def __iter__(self): + return iter(self.args) + + def __add__(self, other): + if isinstance(other, Tuple): + return Tuple(*(self.args + other.args)) + elif isinstance(other, tuple): + return Tuple(*(self.args + other)) + else: + return NotImplemented + + def __radd__(self, other): + if isinstance(other, Tuple): + return Tuple(*(other.args + self.args)) + elif isinstance(other, tuple): + return Tuple(*(other + self.args)) + else: + return NotImplemented + + def __mul__(self, other): + try: + n = as_int(other) + except ValueError: + raise TypeError("Can't multiply sequence by non-integer of type '%s'" % type(other)) + return self.func(*(self.args*n)) + + __rmul__ = __mul__ + + def __eq__(self, other): + if isinstance(other, Basic): + return super().__eq__(other) + return self.args == other + + def __ne__(self, other): + if isinstance(other, Basic): + return super().__ne__(other) + return self.args != other + + def __hash__(self): + return hash(self.args) + + def _to_mpmath(self, prec): + return tuple(a._to_mpmath(prec) for a in self.args) + + def __lt__(self, other): + return _sympify(self.args < other.args) + + def __le__(self, other): + return _sympify(self.args <= other.args) + + # XXX: Basic defines count() as something different, so we can't + # redefine it here. Originally this lead to cse() test failure. + def tuple_count(self, value) -> int: + """Return number of occurrences of value.""" + return self.args.count(value) + + def index(self, value, start=None, stop=None): + """Searches and returns the first index of the value.""" + # XXX: One would expect: + # + # return self.args.index(value, start, stop) + # + # here. Any trouble with that? Yes: + # + # >>> (1,).index(1, None, None) + # Traceback (most recent call last): + # File "", line 1, in + # TypeError: slice indices must be integers or None or have an __index__ method + # + # See: http://bugs.python.org/issue13340 + + if start is None and stop is None: + return self.args.index(value) + elif stop is None: + return self.args.index(value, start) + else: + return self.args.index(value, start, stop) + + @property + def kind(self): + """ + The kind of a Tuple instance. + + The kind of a Tuple is always of :class:`TupleKind` but + parametrised by the number of elements and the kind of each element. + + Examples + ======== + + >>> from sympy import Tuple, Matrix + >>> Tuple(1, 2).kind + TupleKind(NumberKind, NumberKind) + >>> Tuple(Matrix([1, 2]), 1).kind + TupleKind(MatrixKind(NumberKind), NumberKind) + >>> Tuple(1, 2).kind.element_kind + (NumberKind, NumberKind) + + See Also + ======== + + sympy.matrices.kind.MatrixKind + sympy.core.kind.NumberKind + """ + return TupleKind(*(i.kind for i in self.args)) + +_sympy_converter[tuple] = lambda tup: Tuple(*tup) + + + + + +def tuple_wrapper(method): + """ + Decorator that converts any tuple in the function arguments into a Tuple. + + Explanation + =========== + + The motivation for this is to provide simple user interfaces. The user can + call a function with regular tuples in the argument, and the wrapper will + convert them to Tuples before handing them to the function. + + Explanation + =========== + + >>> from sympy.core.containers import tuple_wrapper + >>> def f(*args): + ... return args + >>> g = tuple_wrapper(f) + + The decorated function g sees only the Tuple argument: + + >>> g(0, (1, 2), 3) + (0, (1, 2), 3) + + """ + def wrap_tuples(*args, **kw_args): + newargs = [] + for arg in args: + if isinstance(arg, tuple): + newargs.append(Tuple(*arg)) + else: + newargs.append(arg) + return method(*newargs, **kw_args) + return wrap_tuples + + +class Dict(Basic): + """ + Wrapper around the builtin dict object. + + Explanation + =========== + + The Dict is a subclass of Basic, so that it works well in the + SymPy framework. Because it is immutable, it may be included + in sets, but its values must all be given at instantiation and + cannot be changed afterwards. Otherwise it behaves identically + to the Python dict. + + Examples + ======== + + >>> from sympy import Dict, Symbol + + >>> D = Dict({1: 'one', 2: 'two'}) + >>> for key in D: + ... if key == 1: + ... print('%s %s' % (key, D[key])) + 1 one + + The args are sympified so the 1 and 2 are Integers and the values + are Symbols. Queries automatically sympify args so the following work: + + >>> 1 in D + True + >>> D.has(Symbol('one')) # searches keys and values + True + >>> 'one' in D # not in the keys + False + >>> D[1] + one + + """ + + elements: frozenset[Tuple] + _dict: dict[Basic, Basic] + + def __new__(cls, *args): + if len(args) == 1 and isinstance(args[0], (dict, Dict)): + items = [Tuple(k, v) for k, v in args[0].items()] + elif iterable(args) and all(len(arg) == 2 for arg in args): + items = [Tuple(k, v) for k, v in args] + else: + raise TypeError('Pass Dict args as Dict((k1, v1), ...) or Dict({k1: v1, ...})') + elements = frozenset(items) + obj = Basic.__new__(cls, *ordered(items)) + obj.elements = elements + obj._dict = dict(items) # In case Tuple decides it wants to sympify + return obj + + def __getitem__(self, key): + """x.__getitem__(y) <==> x[y]""" + try: + key = _sympify(key) + except SympifyError: + raise KeyError(key) + + return self._dict[key] + + def __setitem__(self, key, value): + raise NotImplementedError("SymPy Dicts are Immutable") + + def items(self): + '''Returns a set-like object providing a view on dict's items. + ''' + return self._dict.items() + + def keys(self): + '''Returns the list of the dict's keys.''' + return self._dict.keys() + + def values(self): + '''Returns the list of the dict's values.''' + return self._dict.values() + + def __iter__(self): + '''x.__iter__() <==> iter(x)''' + return iter(self._dict) + + def __len__(self): + '''x.__len__() <==> len(x)''' + return self._dict.__len__() + + def get(self, key, default=None): + '''Returns the value for key if the key is in the dictionary.''' + try: + key = _sympify(key) + except SympifyError: + return default + return self._dict.get(key, default) + + def __contains__(self, key): + '''D.__contains__(k) -> True if D has a key k, else False''' + try: + key = _sympify(key) + except SympifyError: + return False + return key in self._dict + + def __lt__(self, other): + return _sympify(self.args < other.args) + + @property + def _sorted_args(self): + return tuple(sorted(self.args, key=default_sort_key)) + + def __eq__(self, other): + if isinstance(other, dict): + return self == Dict(other) + return super().__eq__(other) + + __hash__ : Callable[[Basic], Any] = Basic.__hash__ + +# this handles dict, defaultdict, OrderedDict +_sympy_converter[dict] = lambda d: Dict(*d.items()) + +class OrderedSet(MutableSet): + def __init__(self, iterable=None): + if iterable: + self.map = OrderedDict((item, None) for item in iterable) + else: + self.map = OrderedDict() + + def __len__(self): + return len(self.map) + + def __contains__(self, key): + return key in self.map + + def add(self, key): + self.map[key] = None + + def discard(self, key): + self.map.pop(key) + + def pop(self, last=True): + return self.map.popitem(last=last)[0] + + def __iter__(self): + yield from self.map.keys() + + def __repr__(self): + if not self.map: + return '%s()' % (self.__class__.__name__,) + return '%s(%r)' % (self.__class__.__name__, list(self.map.keys())) + + def intersection(self, other): + return self.__class__([val for val in self if val in other]) + + def difference(self, other): + return self.__class__([val for val in self if val not in other]) + + def update(self, iterable): + for val in iterable: + self.add(val) + +class TupleKind(Kind): + """ + TupleKind is a subclass of Kind, which is used to define Kind of ``Tuple``. + + Parameters of TupleKind will be kinds of all the arguments in Tuples, for + example + + Parameters + ========== + + args : tuple(element_kind) + element_kind is kind of element. + args is tuple of kinds of element + + Examples + ======== + + >>> from sympy import Tuple + >>> Tuple(1, 2).kind + TupleKind(NumberKind, NumberKind) + >>> Tuple(1, 2).kind.element_kind + (NumberKind, NumberKind) + + See Also + ======== + + sympy.core.kind.NumberKind + MatrixKind + sympy.sets.sets.SetKind + """ + def __new__(cls, *args): + obj = super().__new__(cls, *args) + obj.element_kind = args + return obj + + def __repr__(self): + return "TupleKind{}".format(self.element_kind) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/core.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/core.py new file mode 100644 index 0000000000000000000000000000000000000000..8a45bb06919d7a8ef88e2c9958decac705c0b8ee --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/core.py @@ -0,0 +1,21 @@ +""" The core's core. """ +from __future__ import annotations + + +class Registry: + """ + Base class for registry objects. + + Registries map a name to an object using attribute notation. Registry + classes behave singletonically: all their instances share the same state, + which is stored in the class object. + + All subclasses should set `__slots__ = ()`. + """ + __slots__ = () + + def __setattr__(self, name, obj): + setattr(self.__class__, name, obj) + + def __delattr__(self, name): + delattr(self.__class__, name) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/coreerrors.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/coreerrors.py new file mode 100644 index 0000000000000000000000000000000000000000..d2dbdd5227d7b0495145072d31bd993f13f31f0d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/coreerrors.py @@ -0,0 +1,23 @@ +"""Definitions of common exceptions for :mod:`sympy.core` module. """ + +from typing import Callable + + +class BaseCoreError(Exception): + """Base class for core related exceptions. """ + + +class NonCommutativeExpression(BaseCoreError): + """Raised when expression didn't have commutative property. """ + + +class LazyExceptionMessage: + """Wrapper class that lets you specify an expensive to compute + error message that is only evaluated if the error is rendered.""" + callback: Callable[[], str] + + def __init__(self, callback: Callable[[], str]): + self.callback = callback + + def __str__(self): + return self.callback() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/decorators.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/decorators.py new file mode 100644 index 0000000000000000000000000000000000000000..afd6ae0c72dc32d260586c6411507e4859a9f8ff --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/decorators.py @@ -0,0 +1,250 @@ +""" +SymPy core decorators. + +The purpose of this module is to expose decorators without any other +dependencies, so that they can be easily imported anywhere in sympy/core. +""" + +from __future__ import annotations + +from typing import TYPE_CHECKING + +from functools import wraps +from .sympify import SympifyError, sympify + + +if TYPE_CHECKING: + from typing import Callable, TypeVar, Union + T1 = TypeVar('T1') + T2 = TypeVar('T2') + T3 = TypeVar('T3') + + +def _sympifyit(arg, retval=None) -> Callable[[Callable[[T1, T2], T3]], Callable[[T1, T2], T3]]: + """ + decorator to smartly _sympify function arguments + + Explanation + =========== + + @_sympifyit('other', NotImplemented) + def add(self, other): + ... + + In add, other can be thought of as already being a SymPy object. + + If it is not, the code is likely to catch an exception, then other will + be explicitly _sympified, and the whole code restarted. + + if _sympify(arg) fails, NotImplemented will be returned + + See also + ======== + + __sympifyit + """ + def deco(func): + return __sympifyit(func, arg, retval) + + return deco + + +def __sympifyit(func, arg, retval=None): + """Decorator to _sympify `arg` argument for function `func`. + + Do not use directly -- use _sympifyit instead. + """ + + # we support f(a,b) only + if not func.__code__.co_argcount: + raise LookupError("func not found") + # only b is _sympified + assert func.__code__.co_varnames[1] == arg + if retval is None: + @wraps(func) + def __sympifyit_wrapper(a, b): + return func(a, sympify(b, strict=True)) + + else: + @wraps(func) + def __sympifyit_wrapper(a, b): + try: + # If an external class has _op_priority, it knows how to deal + # with SymPy objects. Otherwise, it must be converted. + if not hasattr(b, '_op_priority'): + b = sympify(b, strict=True) + return func(a, b) + except SympifyError: + return retval + + return __sympifyit_wrapper + + +def call_highest_priority(method_name: str + ) -> Callable[[Callable[[T1, T2], T3]], Callable[[T1, T2], T3]]: + """A decorator for binary special methods to handle _op_priority. + + Explanation + =========== + + Binary special methods in Expr and its subclasses use a special attribute + '_op_priority' to determine whose special method will be called to + handle the operation. In general, the object having the highest value of + '_op_priority' will handle the operation. Expr and subclasses that define + custom binary special methods (__mul__, etc.) should decorate those + methods with this decorator to add the priority logic. + + The ``method_name`` argument is the name of the method of the other class + that will be called. Use this decorator in the following manner:: + + # Call other.__rmul__ if other._op_priority > self._op_priority + @call_highest_priority('__rmul__') + def __mul__(self, other): + ... + + # Call other.__mul__ if other._op_priority > self._op_priority + @call_highest_priority('__mul__') + def __rmul__(self, other): + ... + """ + def priority_decorator(func: Callable[[T1, T2], T3]) -> Callable[[T1, T2], T3]: + @wraps(func) + def binary_op_wrapper(self: T1, other: T2) -> T3: + if hasattr(other, '_op_priority'): + if other._op_priority > self._op_priority: # type: ignore + f: Union[Callable[[T1], T3], None] = getattr(other, method_name, None) + if f is not None: + return f(self) + return func(self, other) + return binary_op_wrapper + return priority_decorator + + +def sympify_method_args(cls: type[T1]) -> type[T1]: + '''Decorator for a class with methods that sympify arguments. + + Explanation + =========== + + The sympify_method_args decorator is to be used with the sympify_return + decorator for automatic sympification of method arguments. This is + intended for the common idiom of writing a class like : + + Examples + ======== + + >>> from sympy import Basic, SympifyError, S + >>> from sympy.core.sympify import _sympify + + >>> class MyTuple(Basic): + ... def __add__(self, other): + ... try: + ... other = _sympify(other) + ... except SympifyError: + ... return NotImplemented + ... if not isinstance(other, MyTuple): + ... return NotImplemented + ... return MyTuple(*(self.args + other.args)) + + >>> MyTuple(S(1), S(2)) + MyTuple(S(3), S(4)) + MyTuple(1, 2, 3, 4) + + In the above it is important that we return NotImplemented when other is + not sympifiable and also when the sympified result is not of the expected + type. This allows the MyTuple class to be used cooperatively with other + classes that overload __add__ and want to do something else in combination + with instance of Tuple. + + Using this decorator the above can be written as + + >>> from sympy.core.decorators import sympify_method_args, sympify_return + + >>> @sympify_method_args + ... class MyTuple(Basic): + ... @sympify_return([('other', 'MyTuple')], NotImplemented) + ... def __add__(self, other): + ... return MyTuple(*(self.args + other.args)) + + >>> MyTuple(S(1), S(2)) + MyTuple(S(3), S(4)) + MyTuple(1, 2, 3, 4) + + The idea here is that the decorators take care of the boiler-plate code + for making this happen in each method that potentially needs to accept + unsympified arguments. Then the body of e.g. the __add__ method can be + written without needing to worry about calling _sympify or checking the + type of the resulting object. + + The parameters for sympify_return are a list of tuples of the form + (parameter_name, expected_type) and the value to return (e.g. + NotImplemented). The expected_type parameter can be a type e.g. Tuple or a + string 'Tuple'. Using a string is useful for specifying a Type within its + class body (as in the above example). + + Notes: Currently sympify_return only works for methods that take a single + argument (not including self). Specifying an expected_type as a string + only works for the class in which the method is defined. + ''' + # Extract the wrapped methods from each of the wrapper objects created by + # the sympify_return decorator. Doing this here allows us to provide the + # cls argument which is used for forward string referencing. + for attrname, obj in cls.__dict__.items(): + if isinstance(obj, _SympifyWrapper): + setattr(cls, attrname, obj.make_wrapped(cls)) + return cls + + +def sympify_return(*args): + '''Function/method decorator to sympify arguments automatically + + See the docstring of sympify_method_args for explanation. + ''' + # Store a wrapper object for the decorated method + def wrapper(func: Callable[[T1, T2], T3]) -> Callable[[T1, T2], T3]: + return _SympifyWrapper(func, args) # type: ignore + return wrapper + + +class _SympifyWrapper: + '''Internal class used by sympify_return and sympify_method_args''' + + def __init__(self, func, args): + self.func = func + self.args = args + + def make_wrapped(self, cls): + func = self.func + parameters, retval = self.args + + # XXX: Handle more than one parameter? + [(parameter, expectedcls)] = parameters + + # Handle forward references to the current class using strings + if expectedcls == cls.__name__: + expectedcls = cls + + # Raise RuntimeError since this is a failure at import time and should + # not be recoverable. + nargs = func.__code__.co_argcount + # we support f(a, b) only + if nargs != 2: + raise RuntimeError('sympify_return can only be used with 2 argument functions') + # only b is _sympified + if func.__code__.co_varnames[1] != parameter: + raise RuntimeError('parameter name mismatch "%s" in %s' % + (parameter, func.__name__)) + + @wraps(func) + def _func(self, other): + # XXX: The check for _op_priority here should be removed. It is + # needed to stop mutable matrices from being sympified to + # immutable matrices which breaks things in quantum... + if not hasattr(other, '_op_priority'): + try: + other = sympify(other, strict=True) + except SympifyError: + return retval + if not isinstance(other, expectedcls): + return retval + return func(self, other) + + return _func diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/evalf.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/evalf.py new file mode 100644 index 0000000000000000000000000000000000000000..55a981090360556b357ec1cade5576e226633be8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/evalf.py @@ -0,0 +1,1808 @@ +""" +Adaptive numerical evaluation of SymPy expressions, using mpmath +for mathematical functions. +""" +from __future__ import annotations +from typing import Callable, TYPE_CHECKING, Any, overload, Type + +import math + +import mpmath.libmp as libmp +from mpmath import ( + make_mpc, make_mpf, mp, mpc, mpf, nsum, quadts, quadosc, workprec) +from mpmath import inf as mpmath_inf +from mpmath.libmp import (from_int, from_man_exp, from_rational, fhalf, + fnan, finf, fninf, fnone, fone, fzero, mpf_abs, mpf_add, + mpf_atan, mpf_atan2, mpf_cmp, mpf_cos, mpf_e, mpf_exp, mpf_log, mpf_lt, + mpf_mul, mpf_neg, mpf_pi, mpf_pow, mpf_pow_int, mpf_shift, mpf_sin, + mpf_sqrt, normalize, round_nearest, to_int, to_str, mpf_tan) +from mpmath.libmp import bitcount as mpmath_bitcount +from mpmath.libmp.backend import MPZ +from mpmath.libmp.libmpc import _infs_nan +from mpmath.libmp.libmpf import dps_to_prec, prec_to_dps + +from .sympify import sympify +from .singleton import S +from sympy.external.gmpy import SYMPY_INTS +from sympy.utilities.iterables import is_sequence +from sympy.utilities.lambdify import lambdify +from sympy.utilities.misc import as_int + +if TYPE_CHECKING: + from sympy.core.expr import Expr + from sympy.core.add import Add + from sympy.core.mul import Mul + from sympy.core.power import Pow + from sympy.core.symbol import Symbol + from sympy.integrals.integrals import Integral + from sympy.concrete.summations import Sum + from sympy.concrete.products import Product + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.complexes import Abs, re, im + from sympy.functions.elementary.integers import ceiling, floor + from sympy.functions.elementary.trigonometric import atan + from .numbers import Float, Rational, Integer, AlgebraicNumber, Number + +LG10 = math.log2(10) +rnd = round_nearest + + +def bitcount(n): + """Return smallest integer, b, such that |n|/2**b < 1. + """ + return mpmath_bitcount(abs(int(n))) + +# Used in a few places as placeholder values to denote exponents and +# precision levels, e.g. of exact numbers. Must be careful to avoid +# passing these to mpmath functions or returning them in final results. +INF = float(mpmath_inf) +MINUS_INF = float(-mpmath_inf) + +# ~= 100 digits. Real men set this to INF. +DEFAULT_MAXPREC = 333 + + +class PrecisionExhausted(ArithmeticError): + pass + +#----------------------------------------------------------------------------# +# # +# Helper functions for arithmetic and complex parts # +# # +#----------------------------------------------------------------------------# + +""" +An mpf value tuple is a tuple of integers (sign, man, exp, bc) +representing a floating-point number: [1, -1][sign]*man*2**exp where +sign is 0 or 1 and bc should correspond to the number of bits used to +represent the mantissa (man) in binary notation, e.g. +""" + +MPF_TUP = tuple[int, int, int, int] # mpf value tuple + +""" +Explanation +=========== + +>>> from sympy.core.evalf import bitcount +>>> sign, man, exp, bc = 0, 5, 1, 3 +>>> n = [1, -1][sign]*man*2**exp +>>> n, bitcount(man) +(10, 3) + +A temporary result is a tuple (re, im, re_acc, im_acc) where +re and im are nonzero mpf value tuples representing approximate +numbers, or None to denote exact zeros. + +re_acc, im_acc are integers denoting log2(e) where e is the estimated +relative accuracy of the respective complex part, but may be anything +if the corresponding complex part is None. + +""" +TMP_RES = Any # temporary result, should be some variant of +# tUnion[tTuple[Optional[MPF_TUP], Optional[MPF_TUP], +# Optional[int], Optional[int]], +# 'ComplexInfinity'] +# but mypy reports error because it doesn't know as we know +# 1. re and re_acc are either both None or both MPF_TUP +# 2. sometimes the result can't be zoo + +# type of the "options" parameter in internal evalf functions +OPT_DICT = dict[str, Any] + + +def fastlog(x: MPF_TUP | None) -> int | Any: + """Fast approximation of log2(x) for an mpf value tuple x. + + Explanation + =========== + + Calculated as exponent + width of mantissa. This is an + approximation for two reasons: 1) it gives the ceil(log2(abs(x))) + value and 2) it is too high by 1 in the case that x is an exact + power of 2. Although this is easy to remedy by testing to see if + the odd mpf mantissa is 1 (indicating that one was dealing with + an exact power of 2) that would decrease the speed and is not + necessary as this is only being used as an approximation for the + number of bits in x. The correct return value could be written as + "x[2] + (x[3] if x[1] != 1 else 0)". + Since mpf tuples always have an odd mantissa, no check is done + to see if the mantissa is a multiple of 2 (in which case the + result would be too large by 1). + + Examples + ======== + + >>> from sympy import log + >>> from sympy.core.evalf import fastlog, bitcount + >>> s, m, e = 0, 5, 1 + >>> bc = bitcount(m) + >>> n = [1, -1][s]*m*2**e + >>> n, (log(n)/log(2)).evalf(2), fastlog((s, m, e, bc)) + (10, 3.3, 4) + """ + + if not x or x == fzero: + return MINUS_INF + return x[2] + x[3] + + +def pure_complex(v: Expr, or_real=False) -> tuple[Number, Number] | None: + """Return a and b if v matches a + I*b where b is not zero and + a and b are Numbers, else None. If `or_real` is True then 0 will + be returned for `b` if `v` is a real number. + + Examples + ======== + + >>> from sympy.core.evalf import pure_complex + >>> from sympy import sqrt, I, S + >>> a, b, surd = S(2), S(3), sqrt(2) + >>> pure_complex(a) + >>> pure_complex(a, or_real=True) + (2, 0) + >>> pure_complex(surd) + >>> pure_complex(a + b*I) + (2, 3) + >>> pure_complex(I) + (0, 1) + """ + h, t = v.as_coeff_Add() + if t: + c, i = t.as_coeff_Mul() + if i is S.ImaginaryUnit: + return h, c + elif or_real: + return h, S.Zero + return None + + +# I don't know what this is, see function scaled_zero below +SCALED_ZERO_TUP = tuple[list[int], int, int, int] + + + +@overload +def scaled_zero(mag: SCALED_ZERO_TUP, sign=1) -> MPF_TUP: + ... +@overload +def scaled_zero(mag: int, sign=1) -> tuple[SCALED_ZERO_TUP, int]: + ... +def scaled_zero(mag: SCALED_ZERO_TUP | int, sign=1) -> \ + MPF_TUP | tuple[SCALED_ZERO_TUP, int]: + """Return an mpf representing a power of two with magnitude ``mag`` + and -1 for precision. Or, if ``mag`` is a scaled_zero tuple, then just + remove the sign from within the list that it was initially wrapped + in. + + Examples + ======== + + >>> from sympy.core.evalf import scaled_zero + >>> from sympy import Float + >>> z, p = scaled_zero(100) + >>> z, p + (([0], 1, 100, 1), -1) + >>> ok = scaled_zero(z) + >>> ok + (0, 1, 100, 1) + >>> Float(ok) + 1.26765060022823e+30 + >>> Float(ok, p) + 0.e+30 + >>> ok, p = scaled_zero(100, -1) + >>> Float(scaled_zero(ok), p) + -0.e+30 + """ + if isinstance(mag, tuple) and len(mag) == 4 and iszero(mag, scaled=True): + return (mag[0][0],) + mag[1:] + elif isinstance(mag, SYMPY_INTS): + if sign not in [-1, 1]: + raise ValueError('sign must be +/-1') + rv, p = mpf_shift(fone, mag), -1 + s = 0 if sign == 1 else 1 + rv = ([s],) + rv[1:] + return rv, p + else: + raise ValueError('scaled zero expects int or scaled_zero tuple.') + + +def iszero(mpf: MPF_TUP | SCALED_ZERO_TUP | None, scaled=False) -> bool | None: + if not scaled: + return not mpf or not mpf[1] and not mpf[-1] + return mpf and isinstance(mpf[0], list) and mpf[1] == mpf[-1] == 1 + + +def complex_accuracy(result: TMP_RES) -> int | Any: + """ + Returns relative accuracy of a complex number with given accuracies + for the real and imaginary parts. The relative accuracy is defined + in the complex norm sense as ||z|+|error|| / |z| where error + is equal to (real absolute error) + (imag absolute error)*i. + + The full expression for the (logarithmic) error can be approximated + easily by using the max norm to approximate the complex norm. + + In the worst case (re and im equal), this is wrong by a factor + sqrt(2), or by log2(sqrt(2)) = 0.5 bit. + """ + if result is S.ComplexInfinity: + return INF + re, im, re_acc, im_acc = result + if not im: + if not re: + return INF + return re_acc + if not re: + return im_acc + re_size = fastlog(re) + im_size = fastlog(im) + absolute_error = max(re_size - re_acc, im_size - im_acc) + relative_error = absolute_error - max(re_size, im_size) + return -relative_error + + +def get_abs(expr: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + result = evalf(expr, prec + 2, options) + if result is S.ComplexInfinity: + return finf, None, prec, None + re, im, re_acc, im_acc = result + if not re: + re, re_acc, im, im_acc = im, im_acc, re, re_acc + if im: + if expr.is_number: + abs_expr, _, acc, _ = evalf(abs(N(expr, prec + 2)), + prec + 2, options) + return abs_expr, None, acc, None + else: + if 'subs' in options: + return libmp.mpc_abs((re, im), prec), None, re_acc, None + return abs(expr), None, prec, None + elif re: + return mpf_abs(re), None, re_acc, None + else: + return None, None, None, None + + +def get_complex_part(expr: Expr, no: int, prec: int, options: OPT_DICT) -> TMP_RES: + """no = 0 for real part, no = 1 for imaginary part""" + workprec = prec + i = 0 + while 1: + res = evalf(expr, workprec, options) + if res is S.ComplexInfinity: + return fnan, None, prec, None + value, accuracy = res[no::2] + # XXX is the last one correct? Consider re((1+I)**2).n() + if (not value) or accuracy >= prec or -value[2] > prec: + return value, None, accuracy, None + workprec += max(30, 2**i) + i += 1 + + +def evalf_abs(expr: 'Abs', prec: int, options: OPT_DICT) -> TMP_RES: + return get_abs(expr.args[0], prec, options) + + +def evalf_re(expr: 're', prec: int, options: OPT_DICT) -> TMP_RES: + return get_complex_part(expr.args[0], 0, prec, options) + + +def evalf_im(expr: 'im', prec: int, options: OPT_DICT) -> TMP_RES: + return get_complex_part(expr.args[0], 1, prec, options) + + +def finalize_complex(re: MPF_TUP, im: MPF_TUP, prec: int) -> TMP_RES: + if re == fzero and im == fzero: + raise ValueError("got complex zero with unknown accuracy") + elif re == fzero: + return None, im, None, prec + elif im == fzero: + return re, None, prec, None + + size_re = fastlog(re) + size_im = fastlog(im) + if size_re > size_im: + re_acc = prec + im_acc = prec + min(-(size_re - size_im), 0) + else: + im_acc = prec + re_acc = prec + min(-(size_im - size_re), 0) + return re, im, re_acc, im_acc + + +def chop_parts(value: TMP_RES, prec: int) -> TMP_RES: + """ + Chop off tiny real or complex parts. + """ + if value is S.ComplexInfinity: + return value + re, im, re_acc, im_acc = value + # Method 1: chop based on absolute value + if re and re not in _infs_nan and (fastlog(re) < -prec + 4): + re, re_acc = None, None + if im and im not in _infs_nan and (fastlog(im) < -prec + 4): + im, im_acc = None, None + # Method 2: chop if inaccurate and relatively small + if re and im: + delta = fastlog(re) - fastlog(im) + if re_acc < 2 and (delta - re_acc <= -prec + 4): + re, re_acc = None, None + if im_acc < 2 and (delta - im_acc >= prec - 4): + im, im_acc = None, None + return re, im, re_acc, im_acc + + +def check_target(expr: Expr, result: TMP_RES, prec: int): + a = complex_accuracy(result) + if a < prec: + raise PrecisionExhausted("Failed to distinguish the expression: \n\n%s\n\n" + "from zero. Try simplifying the input, using chop=True, or providing " + "a higher maxn for evalf" % (expr)) + + +def get_integer_part(expr: Expr, no: int, options: OPT_DICT, return_ints=False) -> \ + TMP_RES | tuple[int, int]: + """ + With no = 1, computes ceiling(expr) + With no = -1, computes floor(expr) + + Note: this function either gives the exact result or signals failure. + """ + from sympy.functions.elementary.complexes import re, im + # The expression is likely less than 2^30 or so + assumed_size = 30 + result = evalf(expr, assumed_size, options) + if result is S.ComplexInfinity: + raise ValueError("Cannot get integer part of Complex Infinity") + ire, iim, ire_acc, iim_acc = result + + # We now know the size, so we can calculate how much extra precision + # (if any) is needed to get within the nearest integer + if ire and iim: + gap = max(fastlog(ire) - ire_acc, fastlog(iim) - iim_acc) + elif ire: + gap = fastlog(ire) - ire_acc + elif iim: + gap = fastlog(iim) - iim_acc + else: + # ... or maybe the expression was exactly zero + if return_ints: + return 0, 0 + else: + return None, None, None, None + + margin = 10 + + if gap >= -margin: + prec = margin + assumed_size + gap + ire, iim, ire_acc, iim_acc = evalf( + expr, prec, options) + else: + prec = assumed_size + + # We can now easily find the nearest integer, but to find floor/ceil, we + # must also calculate whether the difference to the nearest integer is + # positive or negative (which may fail if very close). + def calc_part(re_im: Expr, nexpr: MPF_TUP): + from .add import Add + _, _, exponent, _ = nexpr + is_int = exponent == 0 + nint = int(to_int(nexpr, rnd)) + if is_int: + # make sure that we had enough precision to distinguish + # between nint and the re or im part (re_im) of expr that + # was passed to calc_part + ire, iim, ire_acc, iim_acc = evalf( + re_im - nint, 10, options) # don't need much precision + assert not iim + size = -fastlog(ire) + 2 # -ve b/c ire is less than 1 + if size > prec: + ire, iim, ire_acc, iim_acc = evalf( + re_im, size, options) + assert not iim + nexpr = ire + nint = int(to_int(nexpr, rnd)) + _, _, new_exp, _ = ire + is_int = new_exp == 0 + if not is_int: + # if there are subs and they all contain integer re/im parts + # then we can (hopefully) safely substitute them into the + # expression + s = options.get('subs', False) + if s: + # use strict=False with as_int because we take + # 2.0 == 2 + def is_int_reim(x): + """Check for integer or integer + I*integer.""" + try: + as_int(x, strict=False) + return True + except ValueError: + try: + [as_int(i, strict=False) for i in x.as_real_imag()] + return True + except ValueError: + return False + + if all(is_int_reim(v) for v in s.values()): + re_im = re_im.subs(s) + + re_im = Add(re_im, -nint, evaluate=False) + x, _, x_acc, _ = evalf(re_im, 10, options) + try: + check_target(re_im, (x, None, x_acc, None), 3) + except PrecisionExhausted: + if not re_im.equals(0): + raise PrecisionExhausted + x = fzero + nint += int(no*(mpf_cmp(x or fzero, fzero) == no)) + nint = from_int(nint) + return nint, INF + + re_, im_, re_acc, im_acc = None, None, None, None + + if ire is not None and ire != fzero: + re_, re_acc = calc_part(re(expr, evaluate=False), ire) + if iim is not None and iim != fzero: + im_, im_acc = calc_part(im(expr, evaluate=False), iim) + + if return_ints: + return int(to_int(re_ or fzero)), int(to_int(im_ or fzero)) + return re_, im_, re_acc, im_acc + + +def evalf_ceiling(expr: 'ceiling', prec: int, options: OPT_DICT) -> TMP_RES: + return get_integer_part(expr.args[0], 1, options) + + +def evalf_floor(expr: 'floor', prec: int, options: OPT_DICT) -> TMP_RES: + return get_integer_part(expr.args[0], -1, options) + + +def evalf_float(expr: 'Float', prec: int, options: OPT_DICT) -> TMP_RES: + return expr._mpf_, None, prec, None + + +def evalf_rational(expr: 'Rational', prec: int, options: OPT_DICT) -> TMP_RES: + return from_rational(expr.p, expr.q, prec), None, prec, None + + +def evalf_integer(expr: 'Integer', prec: int, options: OPT_DICT) -> TMP_RES: + return from_int(expr.p, prec), None, prec, None + +#----------------------------------------------------------------------------# +# # +# Arithmetic operations # +# # +#----------------------------------------------------------------------------# + + +def add_terms(terms: list, prec: int, target_prec: int) -> \ + tuple[MPF_TUP | SCALED_ZERO_TUP | None, int | None]: + """ + Helper for evalf_add. Adds a list of (mpfval, accuracy) terms. + + Returns + ======= + + - None, None if there are no non-zero terms; + - terms[0] if there is only 1 term; + - scaled_zero if the sum of the terms produces a zero by cancellation + e.g. mpfs representing 1 and -1 would produce a scaled zero which need + special handling since they are not actually zero and they are purposely + malformed to ensure that they cannot be used in anything but accuracy + calculations; + - a tuple that is scaled to target_prec that corresponds to the + sum of the terms. + + The returned mpf tuple will be normalized to target_prec; the input + prec is used to define the working precision. + + XXX explain why this is needed and why one cannot just loop using mpf_add + """ + + terms = [t for t in terms if not iszero(t[0])] + if not terms: + return None, None + elif len(terms) == 1: + return terms[0] + + # see if any argument is NaN or oo and thus warrants a special return + special = [] + from .numbers import Float + for t in terms: + arg = Float._new(t[0], 1) + if arg is S.NaN or arg.is_infinite: + special.append(arg) + if special: + from .add import Add + rv = evalf(Add(*special), prec + 4, {}) + return rv[0], rv[2] + + working_prec = 2*prec + sum_man, sum_exp = 0, 0 + absolute_err: list[int] = [] + + for x, accuracy in terms: + sign, man, exp, bc = x + if sign: + man = -man + absolute_err.append(bc + exp - accuracy) + delta = exp - sum_exp + if exp >= sum_exp: + # x much larger than existing sum? + # first: quick test + if ((delta > working_prec) and + ((not sum_man) or + delta - bitcount(abs(sum_man)) > working_prec)): + sum_man = man + sum_exp = exp + else: + sum_man += (man << delta) + else: + delta = -delta + # x much smaller than existing sum? + if delta - bc > working_prec: + if not sum_man: + sum_man, sum_exp = man, exp + else: + sum_man = (sum_man << delta) + man + sum_exp = exp + absolute_error = max(absolute_err) + if not sum_man: + return scaled_zero(absolute_error) + if sum_man < 0: + sum_sign = 1 + sum_man = -sum_man + else: + sum_sign = 0 + sum_bc = bitcount(sum_man) + sum_accuracy = sum_exp + sum_bc - absolute_error + r = normalize(sum_sign, sum_man, sum_exp, sum_bc, target_prec, + rnd), sum_accuracy + return r + + +def evalf_add(v: 'Add', prec: int, options: OPT_DICT) -> TMP_RES: + res = pure_complex(v) + if res: + h, c = res + re, _, re_acc, _ = evalf(h, prec, options) + im, _, im_acc, _ = evalf(c, prec, options) + return re, im, re_acc, im_acc + + oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC) + + i = 0 + target_prec = prec + while 1: + options['maxprec'] = min(oldmaxprec, 2*prec) + + terms = [evalf(arg, prec + 10, options) for arg in v.args] + n = terms.count(S.ComplexInfinity) + if n >= 2: + return fnan, None, prec, None + re, re_acc = add_terms( + [a[0::2] for a in terms if isinstance(a, tuple) and a[0]], prec, target_prec) + im, im_acc = add_terms( + [a[1::2] for a in terms if isinstance(a, tuple) and a[1]], prec, target_prec) + if n == 1: + if re in (finf, fninf, fnan) or im in (finf, fninf, fnan): + return fnan, None, prec, None + return S.ComplexInfinity + acc = complex_accuracy((re, im, re_acc, im_acc)) + if acc >= target_prec: + if options.get('verbose'): + print("ADD: wanted", target_prec, "accurate bits, got", re_acc, im_acc) + break + else: + if (prec - target_prec) > options['maxprec']: + break + + prec = prec + max(10 + 2**i, target_prec - acc) + i += 1 + if options.get('verbose'): + print("ADD: restarting with prec", prec) + + options['maxprec'] = oldmaxprec + if iszero(re, scaled=True): + re = scaled_zero(re) + if iszero(im, scaled=True): + im = scaled_zero(im) + return re, im, re_acc, im_acc + + +def evalf_mul(v: 'Mul', prec: int, options: OPT_DICT) -> TMP_RES: + res = pure_complex(v) + if res: + # the only pure complex that is a mul is h*I + _, h = res + im, _, im_acc, _ = evalf(h, prec, options) + return None, im, None, im_acc + args = list(v.args) + + # see if any argument is NaN or oo and thus warrants a special return + has_zero = False + special = [] + from .numbers import Float + for arg in args: + result = evalf(arg, prec, options) + if result is S.ComplexInfinity: + special.append(result) + continue + if result[0] is None: + if result[1] is None: + has_zero = True + continue + num = Float._new(result[0], 1) + if num is S.NaN: + return fnan, None, prec, None + if num.is_infinite: + special.append(num) + if special: + if has_zero: + return fnan, None, prec, None + from .mul import Mul + return evalf(Mul(*special), prec + 4, {}) + if has_zero: + return None, None, None, None + + # With guard digits, multiplication in the real case does not destroy + # accuracy. This is also true in the complex case when considering the + # total accuracy; however accuracy for the real or imaginary parts + # separately may be lower. + acc = prec + + # XXX: big overestimate + working_prec = prec + len(args) + 5 + + # Empty product is 1 + start = man, exp, bc = MPZ(1), 0, 1 + + # First, we multiply all pure real or pure imaginary numbers. + # direction tells us that the result should be multiplied by + # I**direction; all other numbers get put into complex_factors + # to be multiplied out after the first phase. + last = len(args) + direction = 0 + args.append(S.One) + complex_factors = [] + + for i, arg in enumerate(args): + if i != last and pure_complex(arg): + args[-1] = (args[-1]*arg).expand() + continue + elif i == last and arg is S.One: + continue + re, im, re_acc, im_acc = evalf(arg, working_prec, options) + if re and im: + complex_factors.append((re, im, re_acc, im_acc)) + continue + elif re: + (s, m, e, b), w_acc = re, re_acc + elif im: + (s, m, e, b), w_acc = im, im_acc + direction += 1 + else: + return None, None, None, None + direction += 2*s + man *= m + exp += e + bc += b + while bc > 3*working_prec: + man >>= working_prec + exp += working_prec + bc -= working_prec + acc = min(acc, w_acc) + sign = (direction & 2) >> 1 + if not complex_factors: + v = normalize(sign, man, exp, bitcount(man), prec, rnd) + # multiply by i + if direction & 1: + return None, v, None, acc + else: + return v, None, acc, None + else: + # initialize with the first term + if (man, exp, bc) != start: + # there was a real part; give it an imaginary part + re, im = (sign, man, exp, bitcount(man)), (0, MPZ(0), 0, 0) + i0 = 0 + else: + # there is no real part to start (other than the starting 1) + wre, wim, wre_acc, wim_acc = complex_factors[0] + acc = min(acc, + complex_accuracy((wre, wim, wre_acc, wim_acc))) + re = wre + im = wim + i0 = 1 + + for wre, wim, wre_acc, wim_acc in complex_factors[i0:]: + # acc is the overall accuracy of the product; we aren't + # computing exact accuracies of the product. + acc = min(acc, + complex_accuracy((wre, wim, wre_acc, wim_acc))) + + use_prec = working_prec + A = mpf_mul(re, wre, use_prec) + B = mpf_mul(mpf_neg(im), wim, use_prec) + C = mpf_mul(re, wim, use_prec) + D = mpf_mul(im, wre, use_prec) + re = mpf_add(A, B, use_prec) + im = mpf_add(C, D, use_prec) + if options.get('verbose'): + print("MUL: wanted", prec, "accurate bits, got", acc) + # multiply by I + if direction & 1: + re, im = mpf_neg(im), re + return re, im, acc, acc + + +def evalf_pow(v: 'Pow', prec: int, options) -> TMP_RES: + + target_prec = prec + base, exp = v.args + + # We handle x**n separately. This has two purposes: 1) it is much + # faster, because we avoid calling evalf on the exponent, and 2) it + # allows better handling of real/imaginary parts that are exactly zero + if exp.is_Integer: + p: int = exp.p # type: ignore + # Exact + if not p: + return fone, None, prec, None + # Exponentiation by p magnifies relative error by |p|, so the + # base must be evaluated with increased precision if p is large + prec += int(math.log2(abs(p))) + result = evalf(base, prec + 5, options) + if result is S.ComplexInfinity: + if p < 0: + return None, None, None, None + return result + re, im, re_acc, im_acc = result + # Real to integer power + if re and not im: + return mpf_pow_int(re, p, target_prec), None, target_prec, None + # (x*I)**n = I**n * x**n + if im and not re: + z = mpf_pow_int(im, p, target_prec) + case = p % 4 + if case == 0: + return z, None, target_prec, None + if case == 1: + return None, z, None, target_prec + if case == 2: + return mpf_neg(z), None, target_prec, None + if case == 3: + return None, mpf_neg(z), None, target_prec + # Zero raised to an integer power + if not re: + if p < 0: + return S.ComplexInfinity + return None, None, None, None + # General complex number to arbitrary integer power + re, im = libmp.mpc_pow_int((re, im), p, prec) + # Assumes full accuracy in input + return finalize_complex(re, im, target_prec) + + result = evalf(base, prec + 5, options) + if result is S.ComplexInfinity: + if exp.is_Rational: + if exp < 0: + return None, None, None, None + return result + raise NotImplementedError + + # Pure square root + if exp is S.Half: + xre, xim, _, _ = result + # General complex square root + if xim: + re, im = libmp.mpc_sqrt((xre or fzero, xim), prec) + return finalize_complex(re, im, prec) + if not xre: + return None, None, None, None + # Square root of a negative real number + if mpf_lt(xre, fzero): + return None, mpf_sqrt(mpf_neg(xre), prec), None, prec + # Positive square root + return mpf_sqrt(xre, prec), None, prec, None + + # We first evaluate the exponent to find its magnitude + # This determines the working precision that must be used + prec += 10 + result = evalf(exp, prec, options) + if result is S.ComplexInfinity: + return fnan, None, prec, None + yre, yim, _, _ = result + # Special cases: x**0 + if not (yre or yim): + return fone, None, prec, None + + ysize = fastlog(yre) + # Restart if too big + # XXX: prec + ysize might exceed maxprec + if ysize > 5: + prec += ysize + yre, yim, _, _ = evalf(exp, prec, options) + + # Pure exponential function; no need to evalf the base + if base is S.Exp1: + if yim: + re, im = libmp.mpc_exp((yre or fzero, yim), prec) + return finalize_complex(re, im, target_prec) + return mpf_exp(yre, target_prec), None, target_prec, None + + xre, xim, _, _ = evalf(base, prec + 5, options) + # 0**y + if not (xre or xim): + if yim: + return fnan, None, prec, None + if yre[0] == 1: # y < 0 + return S.ComplexInfinity + return None, None, None, None + + # (real ** complex) or (complex ** complex) + if yim: + re, im = libmp.mpc_pow( + (xre or fzero, xim or fzero), (yre or fzero, yim), + target_prec) + return finalize_complex(re, im, target_prec) + # complex ** real + if xim: + re, im = libmp.mpc_pow_mpf((xre or fzero, xim), yre, target_prec) + return finalize_complex(re, im, target_prec) + # negative ** real + elif mpf_lt(xre, fzero): + re, im = libmp.mpc_pow_mpf((xre, fzero), yre, target_prec) + return finalize_complex(re, im, target_prec) + # positive ** real + else: + return mpf_pow(xre, yre, target_prec), None, target_prec, None + + +#----------------------------------------------------------------------------# +# # +# Special functions # +# # +#----------------------------------------------------------------------------# + + +def evalf_exp(expr: 'exp', prec: int, options: OPT_DICT) -> TMP_RES: + from .power import Pow + return evalf_pow(Pow(S.Exp1, expr.exp, evaluate=False), prec, options) + + +def evalf_trig(v: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + """ + This function handles sin , cos and tan of complex arguments. + + """ + from sympy.functions.elementary.trigonometric import cos, sin, tan + if isinstance(v, cos): + func = mpf_cos + elif isinstance(v, sin): + func = mpf_sin + elif isinstance(v,tan): + func = mpf_tan + else: + raise NotImplementedError + arg = v.args[0] + # 20 extra bits is possibly overkill. It does make the need + # to restart very unlikely + xprec = prec + 20 + re, im, re_acc, im_acc = evalf(arg, xprec, options) + if im: + if 'subs' in options: + v = v.subs(options['subs']) + return evalf(v._eval_evalf(prec), prec, options) + if not re: + if isinstance(v, cos): + return fone, None, prec, None + elif isinstance(v, sin): + return None, None, None, None + elif isinstance(v,tan): + return None, None, None, None + else: + raise NotImplementedError + # For trigonometric functions, we are interested in the + # fixed-point (absolute) accuracy of the argument. + xsize = fastlog(re) + # Magnitude <= 1.0. OK to compute directly, because there is no + # danger of hitting the first root of cos (with sin, magnitude + # <= 2.0 would actually be ok) + if xsize < 1: + return func(re, prec, rnd), None, prec, None + # Very large + if xsize >= 10: + xprec = prec + xsize + re, im, re_acc, im_acc = evalf(arg, xprec, options) + # Need to repeat in case the argument is very close to a + # multiple of pi (or pi/2), hitting close to a root + while 1: + y = func(re, prec, rnd) + ysize = fastlog(y) + gap = -ysize + accuracy = (xprec - xsize) - gap + if accuracy < prec: + if options.get('verbose'): + print("SIN/COS/TAN", accuracy, "wanted", prec, "gap", gap) + print(to_str(y, 10)) + if xprec > options.get('maxprec', DEFAULT_MAXPREC): + return y, None, accuracy, None + xprec += gap + re, im, re_acc, im_acc = evalf(arg, xprec, options) + continue + else: + return y, None, prec, None + + +def evalf_log(expr: 'log', prec: int, options: OPT_DICT) -> TMP_RES: + if len(expr.args)>1: + expr = expr.doit() + return evalf(expr, prec, options) + arg = expr.args[0] + workprec = prec + 10 + result = evalf(arg, workprec, options) + if result is S.ComplexInfinity: + return result + xre, xim, xacc, _ = result + + # evalf can return NoneTypes if chop=True + # issue 18516, 19623 + if xre is xim is None: + # Dear reviewer, I do not know what -inf is; + # it looks to be (1, 0, -789, -3) + # but I'm not sure in general, + # so we just let mpmath figure + # it out by taking log of 0 directly. + # It would be better to return -inf instead. + xre = fzero + + if xim: + from sympy.functions.elementary.complexes import Abs + from sympy.functions.elementary.exponential import log + + # XXX: use get_abs etc instead + re = evalf_log( + log(Abs(arg, evaluate=False), evaluate=False), prec, options) + im = mpf_atan2(xim, xre or fzero, prec) + return re[0], im, re[2], prec + + imaginary_term = (mpf_cmp(xre, fzero) < 0) + + re = mpf_log(mpf_abs(xre), prec, rnd) + size = fastlog(re) + if prec - size > workprec and re != fzero: + from .add import Add + # We actually need to compute 1+x accurately, not x + add = Add(S.NegativeOne, arg, evaluate=False) + xre, xim, _, _ = evalf_add(add, prec, options) + prec2 = workprec - fastlog(xre) + # xre is now x - 1 so we add 1 back here to calculate x + re = mpf_log(mpf_abs(mpf_add(xre, fone, prec2)), prec, rnd) + + re_acc = prec + + if imaginary_term: + return re, mpf_pi(prec), re_acc, prec + else: + return re, None, re_acc, None + + +def evalf_atan(v: 'atan', prec: int, options: OPT_DICT) -> TMP_RES: + arg = v.args[0] + xre, xim, reacc, imacc = evalf(arg, prec + 5, options) + if xre is xim is None: + return (None,)*4 + if xim: + raise NotImplementedError + return mpf_atan(xre, prec, rnd), None, prec, None + + +def evalf_subs(prec: int, subs: dict) -> dict: + """ Change all Float entries in `subs` to have precision prec. """ + newsubs = {} + for a, b in subs.items(): + b = S(b) + if b.is_Float: + b = b._eval_evalf(prec) + newsubs[a] = b + return newsubs + + +def evalf_piecewise(expr: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + from .numbers import Float, Integer + if 'subs' in options: + expr = expr.subs(evalf_subs(prec, options['subs'])) + newopts = options.copy() + del newopts['subs'] + if hasattr(expr, 'func'): + return evalf(expr, prec, newopts) + if isinstance(expr, float): + return evalf(Float(expr), prec, newopts) + if isinstance(expr, int): + return evalf(Integer(expr), prec, newopts) + + # We still have undefined symbols + raise NotImplementedError + + +def evalf_alg_num(a: 'AlgebraicNumber', prec: int, options: OPT_DICT) -> TMP_RES: + return evalf(a.to_root(), prec, options) + +#----------------------------------------------------------------------------# +# # +# High-level operations # +# # +#----------------------------------------------------------------------------# + + +def as_mpmath(x: Any, prec: int, options: OPT_DICT) -> mpc | mpf: + from .numbers import Infinity, NegativeInfinity, Zero + x = sympify(x) + if isinstance(x, Zero) or x == 0.0: + return mpf(0) + if isinstance(x, Infinity): + return mpf('inf') + if isinstance(x, NegativeInfinity): + return mpf('-inf') + # XXX + result = evalf(x, prec, options) + return quad_to_mpmath(result) + + +def do_integral(expr: 'Integral', prec: int, options: OPT_DICT) -> TMP_RES: + func = expr.args[0] + x, xlow, xhigh = expr.args[1] + if xlow == xhigh: + xlow = xhigh = 0 + elif x not in func.free_symbols: + # only the difference in limits matters in this case + # so if there is a symbol in common that will cancel + # out when taking the difference, then use that + # difference + if xhigh.free_symbols & xlow.free_symbols: + diff = xhigh - xlow + if diff.is_number: + xlow, xhigh = 0, diff + + oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC) + options['maxprec'] = min(oldmaxprec, 2*prec) + + with workprec(prec + 5): + xlow = as_mpmath(xlow, prec + 15, options) + xhigh = as_mpmath(xhigh, prec + 15, options) + + # Integration is like summation, and we can phone home from + # the integrand function to update accuracy summation style + # Note that this accuracy is inaccurate, since it fails + # to account for the variable quadrature weights, + # but it is better than nothing + + from sympy.functions.elementary.trigonometric import cos, sin + from .symbol import Wild + + have_part = [False, False] + max_real_term: float | int = MINUS_INF + max_imag_term: float | int = MINUS_INF + + def f(t: Expr) -> mpc | mpf: + nonlocal max_real_term, max_imag_term + re, im, re_acc, im_acc = evalf(func, mp.prec, {'subs': {x: t}}) + + have_part[0] = re or have_part[0] + have_part[1] = im or have_part[1] + + max_real_term = max(max_real_term, fastlog(re)) + max_imag_term = max(max_imag_term, fastlog(im)) + + if im: + return mpc(re or fzero, im) + return mpf(re or fzero) + + if options.get('quad') == 'osc': + A = Wild('A', exclude=[x]) + B = Wild('B', exclude=[x]) + D = Wild('D') + m = func.match(cos(A*x + B)*D) + if not m: + m = func.match(sin(A*x + B)*D) + if not m: + raise ValueError("An integrand of the form sin(A*x+B)*f(x) " + "or cos(A*x+B)*f(x) is required for oscillatory quadrature") + period = as_mpmath(2*S.Pi/m[A], prec + 15, options) + result = quadosc(f, [xlow, xhigh], period=period) + # XXX: quadosc does not do error detection yet + quadrature_error = MINUS_INF + else: + result, quadrature_err = quadts(f, [xlow, xhigh], error=1) + quadrature_error = fastlog(quadrature_err._mpf_) + + options['maxprec'] = oldmaxprec + + if have_part[0]: + re: MPF_TUP | None = result.real._mpf_ + re_acc: int | None + if re == fzero: + re_s, re_acc = scaled_zero(int(-max(prec, max_real_term, quadrature_error))) + re = scaled_zero(re_s) # handled ok in evalf_integral + else: + re_acc = int(-max(max_real_term - fastlog(re) - prec, quadrature_error)) + else: + re, re_acc = None, None + + if have_part[1]: + im: MPF_TUP | None = result.imag._mpf_ + im_acc: int | None + if im == fzero: + im_s, im_acc = scaled_zero(int(-max(prec, max_imag_term, quadrature_error))) + im = scaled_zero(im_s) # handled ok in evalf_integral + else: + im_acc = int(-max(max_imag_term - fastlog(im) - prec, quadrature_error)) + else: + im, im_acc = None, None + + result = re, im, re_acc, im_acc + return result + + +def evalf_integral(expr: 'Integral', prec: int, options: OPT_DICT) -> TMP_RES: + limits = expr.limits + if len(limits) != 1 or len(limits[0]) != 3: + raise NotImplementedError + workprec = prec + i = 0 + maxprec = options.get('maxprec', INF) + while 1: + result = do_integral(expr, workprec, options) + accuracy = complex_accuracy(result) + if accuracy >= prec: # achieved desired precision + break + if workprec >= maxprec: # can't increase accuracy any more + break + if accuracy == -1: + # maybe the answer really is zero and maybe we just haven't increased + # the precision enough. So increase by doubling to not take too long + # to get to maxprec. + workprec *= 2 + else: + workprec += max(prec, 2**i) + workprec = min(workprec, maxprec) + i += 1 + return result + + +def check_convergence(numer: Expr, denom: Expr, n: Symbol) -> tuple[int, Any, Any]: + """ + Returns + ======= + + (h, g, p) where + -- h is: + > 0 for convergence of rate 1/factorial(n)**h + < 0 for divergence of rate factorial(n)**(-h) + = 0 for geometric or polynomial convergence or divergence + + -- abs(g) is: + > 1 for geometric convergence of rate 1/h**n + < 1 for geometric divergence of rate h**n + = 1 for polynomial convergence or divergence + + (g < 0 indicates an alternating series) + + -- p is: + > 1 for polynomial convergence of rate 1/n**h + <= 1 for polynomial divergence of rate n**(-h) + + """ + from sympy.polys.polytools import Poly + npol = Poly(numer, n) + dpol = Poly(denom, n) + p = npol.degree() + q = dpol.degree() + rate = q - p + if rate: + return rate, None, None + constant = dpol.LC() / npol.LC() + from .numbers import equal_valued + if not equal_valued(abs(constant), 1): + return rate, constant, None + if npol.degree() == dpol.degree() == 0: + return rate, constant, 0 + pc = npol.all_coeffs()[1] + qc = dpol.all_coeffs()[1] + return rate, constant, (qc - pc)/dpol.LC() + + +def hypsum(expr: Expr, n: Symbol, start: int, prec: int) -> mpf: + """ + Sum a rapidly convergent infinite hypergeometric series with + given general term, e.g. e = hypsum(1/factorial(n), n). The + quotient between successive terms must be a quotient of integer + polynomials. + """ + from .numbers import Float, equal_valued + from sympy.simplify.simplify import hypersimp + + if prec == float('inf'): + raise NotImplementedError('does not support inf prec') + + if start: + expr = expr.subs(n, n + start) + hs = hypersimp(expr, n) + if hs is None: + raise NotImplementedError("a hypergeometric series is required") + num, den = hs.as_numer_denom() + + func1 = lambdify(n, num) + func2 = lambdify(n, den) + + h, g, p = check_convergence(num, den, n) + + if h < 0: + raise ValueError("Sum diverges like (n!)^%i" % (-h)) + + eterm = expr.subs(n, 0) + if not eterm.is_Rational: + raise NotImplementedError("Non rational term functionality is not implemented.") + + term: Rational = eterm # type: ignore + + # Direct summation if geometric or faster + if h > 0 or (h == 0 and abs(g) > 1): + term = (MPZ(term.p) << prec) // term.q + s = term + k = 1 + while abs(term) > 5: + term *= MPZ(func1(k - 1)) + term //= MPZ(func2(k - 1)) + s += term + k += 1 + return from_man_exp(s, -prec) + else: + alt = g < 0 + if abs(g) < 1: + raise ValueError("Sum diverges like (%i)^n" % abs(1/g)) + if p < 1 or (equal_valued(p, 1) and not alt): + raise ValueError("Sum diverges like n^%i" % (-p)) + # We have polynomial convergence: use Richardson extrapolation + vold = None + ndig = prec_to_dps(prec) + while True: + # Need to use at least quad precision because a lot of cancellation + # might occur in the extrapolation process; we check the answer to + # make sure that the desired precision has been reached, too. + prec2 = 4*prec + term0 = (MPZ(term.p) << prec2) // term.q + + def summand(k, _term=[term0]): + if k: + k = int(k) + _term[0] *= MPZ(func1(k - 1)) + _term[0] //= MPZ(func2(k - 1)) + return make_mpf(from_man_exp(_term[0], -prec2)) + + with workprec(prec): + v = nsum(summand, [0, mpmath_inf], method='richardson') + vf = Float(v, ndig) + if vold is not None and vold == vf: + break + prec += prec # double precision each time + vold = vf + + return v._mpf_ + + +def evalf_prod(expr: 'Product', prec: int, options: OPT_DICT) -> TMP_RES: + if all((l[1] - l[2]).is_Integer for l in expr.limits): + result = evalf(expr.doit(), prec=prec, options=options) + else: + from sympy.concrete.summations import Sum + result = evalf(expr.rewrite(Sum), prec=prec, options=options) + return result + + +def evalf_sum(expr: 'Sum', prec: int, options: OPT_DICT) -> TMP_RES: + from .numbers import Float + if 'subs' in options: + expr = expr.subs(options['subs']) # type: ignore + func = expr.function + limits = expr.limits + if len(limits) != 1 or len(limits[0]) != 3: + raise NotImplementedError + if func.is_zero: + return None, None, prec, None + prec2 = prec + 10 + try: + n, a, b = limits[0] + if b is not S.Infinity or a is S.NegativeInfinity or a != int(a): + raise NotImplementedError + # Use fast hypergeometric summation if possible + v = hypsum(func, n, int(a), prec2) + delta = prec - fastlog(v) + if fastlog(v) < -10: + v = hypsum(func, n, int(a), delta) + return v, None, min(prec, delta), None + except NotImplementedError: + # Euler-Maclaurin summation for general series + eps = Float(2.0)**(-prec) + for i in range(1, 5): + m = n = 2**i * prec + s, err = expr.euler_maclaurin(m=m, n=n, eps=eps, + eval_integral=False) + err = err.evalf() + if err is S.NaN: + raise NotImplementedError + if err <= eps: + break + err = fastlog(evalf(abs(err), 20, options)[0]) + re, im, re_acc, im_acc = evalf(s, prec2, options) + if re_acc is None: + re_acc = -err + if im_acc is None: + im_acc = -err + return re, im, re_acc, im_acc + + +#----------------------------------------------------------------------------# +# # +# Symbolic interface # +# # +#----------------------------------------------------------------------------# + +def evalf_symbol(x: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + val = options['subs'][x] + if isinstance(val, mpf): + if not val: + return None, None, None, None + return val._mpf_, None, prec, None + else: + if '_cache' not in options: + options['_cache'] = {} + cache = options['_cache'] + cached, cached_prec = cache.get(x, (None, MINUS_INF)) + if cached_prec >= prec: + return cached + v = evalf(sympify(val), prec, options) + cache[x] = (v, prec) + return v + +evalf_table: dict[Type[Expr], Callable[[Expr, int, OPT_DICT], TMP_RES]] = {} + + +def _create_evalf_table(): + global evalf_table + from sympy.concrete.products import Product + from sympy.concrete.summations import Sum + from .add import Add + from .mul import Mul + from .numbers import Exp1, Float, Half, ImaginaryUnit, Integer, NaN, NegativeOne, One, Pi, Rational, \ + Zero, ComplexInfinity, AlgebraicNumber + from .power import Pow + from .symbol import Dummy, Symbol + from sympy.functions.elementary.complexes import Abs, im, re + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.integers import ceiling, floor + from sympy.functions.elementary.piecewise import Piecewise + from sympy.functions.elementary.trigonometric import atan, cos, sin, tan + from sympy.integrals.integrals import Integral + evalf_table = { + Symbol: evalf_symbol, + Dummy: evalf_symbol, + Float: evalf_float, + Rational: evalf_rational, + Integer: evalf_integer, + Zero: lambda x, prec, options: (None, None, prec, None), + One: lambda x, prec, options: (fone, None, prec, None), + Half: lambda x, prec, options: (fhalf, None, prec, None), + Pi: lambda x, prec, options: (mpf_pi(prec), None, prec, None), + Exp1: lambda x, prec, options: (mpf_e(prec), None, prec, None), + ImaginaryUnit: lambda x, prec, options: (None, fone, None, prec), + NegativeOne: lambda x, prec, options: (fnone, None, prec, None), + ComplexInfinity: lambda x, prec, options: S.ComplexInfinity, + NaN: lambda x, prec, options: (fnan, None, prec, None), + + exp: evalf_exp, + + cos: evalf_trig, + sin: evalf_trig, + tan: evalf_trig, + + Add: evalf_add, + Mul: evalf_mul, + Pow: evalf_pow, + + log: evalf_log, + atan: evalf_atan, + Abs: evalf_abs, + + re: evalf_re, + im: evalf_im, + floor: evalf_floor, + ceiling: evalf_ceiling, + + Integral: evalf_integral, + Sum: evalf_sum, + Product: evalf_prod, + Piecewise: evalf_piecewise, + + AlgebraicNumber: evalf_alg_num, + } + + +def evalf(x: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + """ + Evaluate the ``Expr`` instance, ``x`` + to a binary precision of ``prec``. This + function is supposed to be used internally. + + Parameters + ========== + + x : Expr + The formula to evaluate to a float. + prec : int + The binary precision that the output should have. + options : dict + A dictionary with the same entries as + ``EvalfMixin.evalf`` and in addition, + ``maxprec`` which is the maximum working precision. + + Returns + ======= + + An optional tuple, ``(re, im, re_acc, im_acc)`` + which are the real, imaginary, real accuracy + and imaginary accuracy respectively. ``re`` is + an mpf value tuple and so is ``im``. ``re_acc`` + and ``im_acc`` are ints. + + NB: all these return values can be ``None``. + If all values are ``None``, then that represents 0. + Note that 0 is also represented as ``fzero = (0, 0, 0, 0)``. + """ + from sympy.functions.elementary.complexes import re as re_, im as im_ + try: + rf = evalf_table[type(x)] + r = rf(x, prec, options) + except KeyError: + # Fall back to ordinary evalf if possible + if 'subs' in options: + x = x.subs(evalf_subs(prec, options['subs'])) + xe = x._eval_evalf(prec) + if xe is None: + raise NotImplementedError + as_real_imag = getattr(xe, "as_real_imag", None) + if as_real_imag is None: + raise NotImplementedError # e.g. FiniteSet(-1.0, 1.0).evalf() + re, im = as_real_imag() + if re.has(re_) or im.has(im_): + raise NotImplementedError + if not re: + re = None + reprec = None + elif re.is_number: + re = re._to_mpmath(prec, allow_ints=False)._mpf_ + reprec = prec + else: + raise NotImplementedError + if not im: + im = None + imprec = None + elif im.is_number: + im = im._to_mpmath(prec, allow_ints=False)._mpf_ + imprec = prec + else: + raise NotImplementedError + r = re, im, reprec, imprec + + if options.get("verbose"): + print("### input", x) + print("### output", to_str(r[0] or fzero, 50) if isinstance(r, tuple) else r) + print("### raw", r) # r[0], r[2] + print() + chop = options.get('chop', False) + if chop: + if chop is True: + chop_prec = prec + else: + # convert (approximately) from given tolerance; + # the formula here will will make 1e-i rounds to 0 for + # i in the range +/-27 while 2e-i will not be chopped + chop_prec = int(round(-3.321*math.log10(chop) + 2.5)) + if chop_prec == 3: + chop_prec -= 1 + r = chop_parts(r, chop_prec) + if options.get("strict"): + check_target(x, r, prec) + return r + + +def quad_to_mpmath(q, ctx=None): + """Turn the quad returned by ``evalf`` into an ``mpf`` or ``mpc``. """ + mpc = make_mpc if ctx is None else ctx.make_mpc + mpf = make_mpf if ctx is None else ctx.make_mpf + if q is S.ComplexInfinity: + raise NotImplementedError + re, im, _, _ = q + if im: + if not re: + re = fzero + return mpc((re, im)) + elif re: + return mpf(re) + else: + return mpf(fzero) + + +class EvalfMixin: + """Mixin class adding evalf capability.""" + + __slots__: tuple[str, ...] = () + + def evalf(self, n=15, subs=None, maxn=100, chop=False, strict=False, quad=None, verbose=False): + """ + Evaluate the given formula to an accuracy of *n* digits. + + Parameters + ========== + + subs : dict, optional + Substitute numerical values for symbols, e.g. + ``subs={x:3, y:1+pi}``. The substitutions must be given as a + dictionary. + + maxn : int, optional + Allow a maximum temporary working precision of maxn digits. + + chop : bool or number, optional + Specifies how to replace tiny real or imaginary parts in + subresults by exact zeros. + + When ``True`` the chop value defaults to standard precision. + + Otherwise the chop value is used to determine the + magnitude of "small" for purposes of chopping. + + >>> from sympy import N + >>> x = 1e-4 + >>> N(x, chop=True) + 0.000100000000000000 + >>> N(x, chop=1e-5) + 0.000100000000000000 + >>> N(x, chop=1e-4) + 0 + + strict : bool, optional + Raise ``PrecisionExhausted`` if any subresult fails to + evaluate to full accuracy, given the available maxprec. + + quad : str, optional + Choose algorithm for numerical quadrature. By default, + tanh-sinh quadrature is used. For oscillatory + integrals on an infinite interval, try ``quad='osc'``. + + verbose : bool, optional + Print debug information. + + Notes + ===== + + When Floats are naively substituted into an expression, + precision errors may adversely affect the result. For example, + adding 1e16 (a Float) to 1 will truncate to 1e16; if 1e16 is + then subtracted, the result will be 0. + That is exactly what happens in the following: + + >>> from sympy.abc import x, y, z + >>> values = {x: 1e16, y: 1, z: 1e16} + >>> (x + y - z).subs(values) + 0 + + Using the subs argument for evalf is the accurate way to + evaluate such an expression: + + >>> (x + y - z).evalf(subs=values) + 1.00000000000000 + """ + from .numbers import Float, Number + n = n if n is not None else 15 + + if subs and is_sequence(subs): + raise TypeError('subs must be given as a dictionary') + + # for sake of sage that doesn't like evalf(1) + if n == 1 and isinstance(self, Number): + from .expr import _mag + rv = self.evalf(2, subs, maxn, chop, strict, quad, verbose) + m = _mag(rv) + rv = rv.round(1 - m) + return rv + + if not evalf_table: + _create_evalf_table() + prec = dps_to_prec(n) + options = {'maxprec': max(prec, int(maxn*LG10)), 'chop': chop, + 'strict': strict, 'verbose': verbose} + if subs is not None: + options['subs'] = subs + if quad is not None: + options['quad'] = quad + try: + result = evalf(self, prec + 4, options) + except NotImplementedError: + # Fall back to the ordinary evalf + if hasattr(self, 'subs') and subs is not None: # issue 20291 + v = self.subs(subs)._eval_evalf(prec) + else: + v = self._eval_evalf(prec) + if v is None: + return self + elif not v.is_number: + return v + try: + # If the result is numerical, normalize it + result = evalf(v, prec, options) + except NotImplementedError: + # Probably contains symbols or unknown functions + return v + if result is S.ComplexInfinity: + return result + re, im, re_acc, im_acc = result + if re is S.NaN or im is S.NaN: + return S.NaN + if re: + p = max(min(prec, re_acc), 1) + re = Float._new(re, p) + else: + re = S.Zero + if im: + p = max(min(prec, im_acc), 1) + im = Float._new(im, p) + return re + im*S.ImaginaryUnit + else: + return re + + n = evalf + + def _evalf(self, prec: int) -> Expr: + """Helper for evalf. Does the same thing but takes binary precision""" + r = self._eval_evalf(prec) + if r is None: + r = self # type: ignore + return r # type: ignore + + def _eval_evalf(self, prec: int) -> Expr | None: + return None + + def _to_mpmath(self, prec, allow_ints=True): + # mpmath functions accept ints as input + errmsg = "cannot convert to mpmath number" + if allow_ints and self.is_Integer: + return self.p + if hasattr(self, '_as_mpf_val'): + return make_mpf(self._as_mpf_val(prec)) + try: + result = evalf(self, prec, {}) + return quad_to_mpmath(result) + except NotImplementedError: + v = self._eval_evalf(prec) + if v is None: + raise ValueError(errmsg) + if v.is_Float: + return make_mpf(v._mpf_) + # Number + Number*I is also fine + re, im = v.as_real_imag() + if allow_ints and re.is_Integer: + re = from_int(re.p) + elif re.is_Float: + re = re._mpf_ + else: + raise ValueError(errmsg) + if allow_ints and im.is_Integer: + im = from_int(im.p) + elif im.is_Float: + im = im._mpf_ + else: + raise ValueError(errmsg) + return make_mpc((re, im)) + + +def N(x, n=15, **options): + r""" + Calls x.evalf(n, \*\*options). + + Explanations + ============ + + Both .n() and N() are equivalent to .evalf(); use the one that you like better. + See also the docstring of .evalf() for information on the options. + + Examples + ======== + + >>> from sympy import Sum, oo, N + >>> from sympy.abc import k + >>> Sum(1/k**k, (k, 1, oo)) + Sum(k**(-k), (k, 1, oo)) + >>> N(_, 4) + 1.291 + + """ + # by using rational=True, any evaluation of a string + # will be done using exact values for the Floats + return sympify(x, rational=True).evalf(n, **options) + + +def _evalf_with_bounded_error(x: Expr, eps: Expr | None = None, + m: int = 0, + options: OPT_DICT | None = None) -> TMP_RES: + """ + Evaluate *x* to within a bounded absolute error. + + Parameters + ========== + + x : Expr + The quantity to be evaluated. + eps : Expr, None, optional (default=None) + Positive real upper bound on the acceptable error. + m : int, optional (default=0) + If *eps* is None, then use 2**(-m) as the upper bound on the error. + options: OPT_DICT + As in the ``evalf`` function. + + Returns + ======= + + A tuple ``(re, im, re_acc, im_acc)``, as returned by ``evalf``. + + See Also + ======== + + evalf + + """ + if eps is not None: + if not (eps.is_Rational or eps.is_Float) or not eps > 0: + raise ValueError("eps must be positive") + r, _, _, _ = evalf(1/eps, 1, {}) + m = fastlog(r) + + c, d, _, _ = evalf(x, 1, {}) + # Note: If x = a + b*I, then |a| <= 2|c| and |b| <= 2|d|, with equality + # only in the zero case. + # If a is non-zero, then |c| = 2**nc for some integer nc, and c has + # bitcount 1. Therefore 2**fastlog(c) = 2**(nc+1) = 2|c| is an upper bound + # on |a|. Likewise for b and d. + nr, ni = fastlog(c), fastlog(d) + n = max(nr, ni) + 1 + # If x is 0, then n is MINUS_INF, and p will be 1. Otherwise, + # n - 1 bits get us past the integer parts of a and b, and +1 accounts for + # the factor of <= sqrt(2) that is |x|/max(|a|, |b|). + p = max(1, m + n + 1) + + options = options or {} + return evalf(x, p, options) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/expr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/expr.py new file mode 100644 index 0000000000000000000000000000000000000000..e66ff239a679942f2cc95c3f66af1fc13f7229d9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/expr.py @@ -0,0 +1,4194 @@ +from __future__ import annotations + +from typing import TYPE_CHECKING, overload +from collections.abc import Iterable, Mapping +from functools import reduce +import re + +from .sympify import sympify, _sympify +from .basic import Basic, Atom +from .singleton import S +from .evalf import EvalfMixin, pure_complex, DEFAULT_MAXPREC +from .decorators import call_highest_priority, sympify_method_args, sympify_return +from .cache import cacheit +from .logic import fuzzy_or, fuzzy_not +from .intfunc import mod_inverse +from .sorting import default_sort_key +from .kind import NumberKind +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.misc import as_int, func_name, filldedent +from sympy.utilities.iterables import has_variety, sift +from mpmath.libmp import mpf_log, prec_to_dps +from mpmath.libmp.libintmath import giant_steps + + +if TYPE_CHECKING: + from typing import Any + from typing_extensions import Self + from .numbers import Number + +from collections import defaultdict + + +def _corem(eq, c): # helper for extract_additively + # return co, diff from co*c + diff + co = [] + non = [] + for i in Add.make_args(eq): + ci = i.coeff(c) + if not ci: + non.append(i) + else: + co.append(ci) + return Add(*co), Add(*non) + + +@sympify_method_args +class Expr(Basic, EvalfMixin): + """ + Base class for algebraic expressions. + + Explanation + =========== + + Everything that requires arithmetic operations to be defined + should subclass this class, instead of Basic (which should be + used only for argument storage and expression manipulation, i.e. + pattern matching, substitutions, etc). + + If you want to override the comparisons of expressions: + Should use _eval_is_ge for inequality, or _eval_is_eq, with multiple dispatch. + _eval_is_ge return true if x >= y, false if x < y, and None if the two types + are not comparable or the comparison is indeterminate + + See Also + ======== + + sympy.core.basic.Basic + """ + + __slots__: tuple[str, ...] = () + + if TYPE_CHECKING: + + def __new__(cls, *args: Basic) -> Self: + ... + + @overload # type: ignore + def subs(self, arg1: Mapping[Basic | complex, Expr | complex], arg2: None=None) -> Expr: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Expr | complex]], arg2: None=None, **kwargs: Any) -> Expr: ... + @overload + def subs(self, arg1: Expr | complex, arg2: Expr | complex) -> Expr: ... + @overload + def subs(self, arg1: Mapping[Basic | complex, Basic | complex], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Basic | complex]], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Basic | complex, arg2: Basic | complex, **kwargs: Any) -> Basic: ... + + def subs(self, arg1: Mapping[Basic | complex, Basic | complex] | Basic | complex, # type: ignore + arg2: Basic | complex | None = None, **kwargs: Any) -> Basic: + ... + + def simplify(self, **kwargs) -> Expr: + ... + + def evalf(self, n: int = 15, subs: dict[Basic, Basic | float] | None = None, + maxn: int = 100, chop: bool = False, strict: bool = False, + quad: str | None = None, verbose: bool = False) -> Expr: + ... + + n = evalf + + is_scalar = True # self derivative is 1 + + @property + def _diff_wrt(self): + """Return True if one can differentiate with respect to this + object, else False. + + Explanation + =========== + + Subclasses such as Symbol, Function and Derivative return True + to enable derivatives wrt them. The implementation in Derivative + separates the Symbol and non-Symbol (_diff_wrt=True) variables and + temporarily converts the non-Symbols into Symbols when performing + the differentiation. By default, any object deriving from Expr + will behave like a scalar with self.diff(self) == 1. If this is + not desired then the object must also set `is_scalar = False` or + else define an _eval_derivative routine. + + Note, see the docstring of Derivative for how this should work + mathematically. In particular, note that expr.subs(yourclass, Symbol) + should be well-defined on a structural level, or this will lead to + inconsistent results. + + Examples + ======== + + >>> from sympy import Expr + >>> e = Expr() + >>> e._diff_wrt + False + >>> class MyScalar(Expr): + ... _diff_wrt = True + ... + >>> MyScalar().diff(MyScalar()) + 1 + >>> class MySymbol(Expr): + ... _diff_wrt = True + ... is_scalar = False + ... + >>> MySymbol().diff(MySymbol()) + Derivative(MySymbol(), MySymbol()) + """ + return False + + @cacheit + def sort_key(self, order=None): + + coeff, expr = self.as_coeff_Mul() + + if expr.is_Pow: + base, exp = expr.as_base_exp() + if base is S.Exp1: + # If we remove this, many doctests will go crazy: + # (keeps E**x sorted like the exp(x) function, + # part of exp(x) to E**x transition) + base, exp = Function("exp")(exp), S.One + expr = base + else: + exp = S.One + + if expr.is_Dummy: + args = (expr.sort_key(),) + elif expr.is_Atom: + args = (str(expr),) + else: + if expr.is_Add: + args = expr.as_ordered_terms(order=order) + elif expr.is_Mul: + args = expr.as_ordered_factors(order=order) + else: + args = expr.args + + args = tuple( + [ default_sort_key(arg, order=order) for arg in args ]) + + args = (len(args), tuple(args)) + exp = exp.sort_key(order=order) + + return expr.class_key(), args, exp, coeff + + def _hashable_content(self): + """Return a tuple of information about self that can be used to + compute the hash. If a class defines additional attributes, + like ``name`` in Symbol, then this method should be updated + accordingly to return such relevant attributes. + Defining more than _hashable_content is necessary if __eq__ has + been defined by a class. See note about this in Basic.__eq__.""" + return self._args + + # *************** + # * Arithmetics * + # *************** + # Expr and its subclasses use _op_priority to determine which object + # passed to a binary special method (__mul__, etc.) will handle the + # operation. In general, the 'call_highest_priority' decorator will choose + # the object with the highest _op_priority to handle the call. + # Custom subclasses that want to define their own binary special methods + # should set an _op_priority value that is higher than the default. + # + # **NOTE**: + # This is a temporary fix, and will eventually be replaced with + # something better and more powerful. See issue 5510. + _op_priority = 10.0 + + @property + def _add_handler(self): + return Add + + @property + def _mul_handler(self): + return Mul + + def __pos__(self) -> Expr: + return self + + def __neg__(self) -> Expr: + # Mul has its own __neg__ routine, so we just + # create a 2-args Mul with the -1 in the canonical + # slot 0. + c = self.is_commutative + return Mul._from_args((S.NegativeOne, self), c) + + def __abs__(self) -> Expr: + from sympy.functions.elementary.complexes import Abs + return Abs(self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__radd__') + def __add__(self, other) -> Expr: + return Add(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__add__') + def __radd__(self, other) -> Expr: + return Add(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rsub__') + def __sub__(self, other) -> Expr: + return Add(self, -other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__sub__') + def __rsub__(self, other) -> Expr: + return Add(other, -self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rmul__') + def __mul__(self, other) -> Expr: + return Mul(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__mul__') + def __rmul__(self, other) -> Expr: + return Mul(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rpow__') + def _pow(self, other): + return Pow(self, other) + + def __pow__(self, other, mod=None) -> Expr: + if mod is None: + return self._pow(other) + try: + _self, other, mod = as_int(self), as_int(other), as_int(mod) + if other >= 0: + return _sympify(pow(_self, other, mod)) + else: + return _sympify(mod_inverse(pow(_self, -other, mod), mod)) + except ValueError: + power = self._pow(other) + try: + return power%mod + except TypeError: + return NotImplemented + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__pow__') + def __rpow__(self, other) -> Expr: + return Pow(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rtruediv__') + def __truediv__(self, other) -> Expr: + denom = Pow(other, S.NegativeOne) + if self is S.One: + return denom + else: + return Mul(self, denom) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__truediv__') + def __rtruediv__(self, other) -> Expr: + denom = Pow(self, S.NegativeOne) + if other is S.One: + return denom + else: + return Mul(other, denom) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rmod__') + def __mod__(self, other) -> Expr: + return Mod(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__mod__') + def __rmod__(self, other) -> Expr: + return Mod(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rfloordiv__') + def __floordiv__(self, other) -> Expr: + from sympy.functions.elementary.integers import floor + return floor(self / other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__floordiv__') + def __rfloordiv__(self, other) -> Expr: + from sympy.functions.elementary.integers import floor + return floor(other / self) + + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rdivmod__') + def __divmod__(self, other) -> tuple[Expr, Expr]: + from sympy.functions.elementary.integers import floor + return floor(self / other), Mod(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__divmod__') + def __rdivmod__(self, other) -> tuple[Expr, Expr]: + from sympy.functions.elementary.integers import floor + return floor(other / self), Mod(other, self) + + def __int__(self) -> int: + if not self.is_number: + raise TypeError("Cannot convert symbols to int") + r = self.round(2) + if not r.is_Number: + raise TypeError("Cannot convert complex to int") + if r in (S.NaN, S.Infinity, S.NegativeInfinity): + raise TypeError("Cannot convert %s to int" % r) + i = int(r) + if not i: + return i + if int_valued(r): + # non-integer self should pass one of these tests + if (self > i) is S.true: + return i + if (self < i) is S.true: + return i - 1 + ok = self.equals(i) + if ok is None: + raise TypeError('cannot compute int value accurately') + if ok: + return i + # off by one + return i - (1 if i > 0 else -1) + return i + + def __float__(self) -> float: + # Don't bother testing if it's a number; if it's not this is going + # to fail, and if it is we still need to check that it evalf'ed to + # a number. + result = self.evalf() + if result.is_Number: + return float(result) + if result.is_number and result.as_real_imag()[1]: + raise TypeError("Cannot convert complex to float") + raise TypeError("Cannot convert expression to float") + + def __complex__(self) -> complex: + result = self.evalf() + re, im = result.as_real_imag() + return complex(float(re), float(im)) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __ge__(self, other): + from .relational import GreaterThan + return GreaterThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __le__(self, other): + from .relational import LessThan + return LessThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __gt__(self, other): + from .relational import StrictGreaterThan + return StrictGreaterThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __lt__(self, other): + from .relational import StrictLessThan + return StrictLessThan(self, other) + + def __trunc__(self): + if not self.is_number: + raise TypeError("Cannot truncate symbols and expressions") + else: + return Integer(self) + + def __format__(self, format_spec: str): + if self.is_number: + mt = re.match(r'\+?\d*\.(\d+)f', format_spec) + if mt: + prec = int(mt.group(1)) + rounded = self.round(prec) + if rounded.is_Integer: + return format(int(rounded), format_spec) + if rounded.is_Float: + return format(rounded, format_spec) + return super().__format__(format_spec) + + @staticmethod + def _from_mpmath(x, prec): + if hasattr(x, "_mpf_"): + return Float._new(x._mpf_, prec) + elif hasattr(x, "_mpc_"): + re, im = x._mpc_ + re = Float._new(re, prec) + im = Float._new(im, prec)*S.ImaginaryUnit + return re + im + else: + raise TypeError("expected mpmath number (mpf or mpc)") + + @property + def is_number(self): + """Returns True if ``self`` has no free symbols and no + undefined functions (AppliedUndef, to be precise). It will be + faster than ``if not self.free_symbols``, however, since + ``is_number`` will fail as soon as it hits a free symbol + or undefined function. + + Examples + ======== + + >>> from sympy import Function, Integral, cos, sin, pi + >>> from sympy.abc import x + >>> f = Function('f') + + >>> x.is_number + False + >>> f(1).is_number + False + >>> (2*x).is_number + False + >>> (2 + Integral(2, x)).is_number + False + >>> (2 + Integral(2, (x, 1, 2))).is_number + True + + Not all numbers are Numbers in the SymPy sense: + + >>> pi.is_number, pi.is_Number + (True, False) + + If something is a number it should evaluate to a number with + real and imaginary parts that are Numbers; the result may not + be comparable, however, since the real and/or imaginary part + of the result may not have precision. + + >>> cos(1).is_number and cos(1).is_comparable + True + + >>> z = cos(1)**2 + sin(1)**2 - 1 + >>> z.is_number + True + >>> z.is_comparable + False + + See Also + ======== + + sympy.core.basic.Basic.is_comparable + """ + return all(obj.is_number for obj in self.args) + + def _eval_is_comparable(self): + # Basic._eval_is_comparable always returns False, so we override it + # here + is_extended_real = self.is_extended_real + if is_extended_real is False: + return False + if not self.is_number: + return False + + # XXX: as_real_imag() can be a very expensive operation. It should not + # be used here because is_comparable is used implicitly in many places. + # Probably this method should just return self.evalf(2).is_Number. + + n, i = self.as_real_imag() + + if not n.is_Number: + n = n.evalf(2) + if not n.is_Number: + return False + + if not i.is_Number: + i = i.evalf(2) + if not i.is_Number: + return False + + if i: + # if _prec = 1 we can't decide and if not, + # the answer is False because numbers with + # imaginary parts can't be compared + # so return False + return False + else: + return n._prec != 1 + + def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1): + """Return self evaluated, if possible, replacing free symbols with + random complex values, if necessary. + + Explanation + =========== + + The random complex value for each free symbol is generated + by the random_complex_number routine giving real and imaginary + parts in the range given by the re_min, re_max, im_min, and im_max + values. The returned value is evaluated to a precision of n + (if given) else the maximum of 15 and the precision needed + to get more than 1 digit of precision. If the expression + could not be evaluated to a number, or could not be evaluated + to more than 1 digit of precision, then None is returned. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import x, y + >>> x._random() # doctest: +SKIP + 0.0392918155679172 + 0.916050214307199*I + >>> x._random(2) # doctest: +SKIP + -0.77 - 0.87*I + >>> (x + y/2)._random(2) # doctest: +SKIP + -0.57 + 0.16*I + >>> sqrt(2)._random(2) + 1.4 + + See Also + ======== + + sympy.core.random.random_complex_number + """ + + free = self.free_symbols + prec = 1 + if free: + from sympy.core.random import random_complex_number + a, c, b, d = re_min, re_max, im_min, im_max + reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True) + for zi in free]))) + try: + nmag = abs(self.evalf(2, subs=reps)) + except (ValueError, TypeError): + # if an out of range value resulted in evalf problems + # then return None -- XXX is there a way to know how to + # select a good random number for a given expression? + # e.g. when calculating n! negative values for n should not + # be used + return None + else: + reps = {} + nmag = abs(self.evalf(2)) + + if not hasattr(nmag, '_prec'): + # e.g. exp_polar(2*I*pi) doesn't evaluate but is_number is True + return None + + if nmag._prec == 1: + # increase the precision up to the default maximum + # precision to see if we can get any significance + + # evaluate + for prec in giant_steps(2, DEFAULT_MAXPREC): + nmag = abs(self.evalf(prec, subs=reps)) + if nmag._prec != 1: + break + + if nmag._prec != 1: + if n is None: + n = max(prec, 15) + return self.evalf(n, subs=reps) + + # never got any significance + return None + + def is_constant(self, *wrt, **flags): + """Return True if self is constant, False if not, or None if + the constancy could not be determined conclusively. + + Explanation + =========== + + If an expression has no free symbols then it is a constant. If + there are free symbols it is possible that the expression is a + constant, perhaps (but not necessarily) zero. To test such + expressions, a few strategies are tried: + + 1) numerical evaluation at two random points. If two such evaluations + give two different values and the values have a precision greater than + 1 then self is not constant. If the evaluations agree or could not be + obtained with any precision, no decision is made. The numerical testing + is done only if ``wrt`` is different than the free symbols. + + 2) differentiation with respect to variables in 'wrt' (or all free + symbols if omitted) to see if the expression is constant or not. This + will not always lead to an expression that is zero even though an + expression is constant (see added test in test_expr.py). If + all derivatives are zero then self is constant with respect to the + given symbols. + + 3) finding out zeros of denominator expression with free_symbols. + It will not be constant if there are zeros. It gives more negative + answers for expression that are not constant. + + If neither evaluation nor differentiation can prove the expression is + constant, None is returned unless two numerical values happened to be + the same and the flag ``failing_number`` is True -- in that case the + numerical value will be returned. + + If flag simplify=False is passed, self will not be simplified; + the default is True since self should be simplified before testing. + + Examples + ======== + + >>> from sympy import cos, sin, Sum, S, pi + >>> from sympy.abc import a, n, x, y + >>> x.is_constant() + False + >>> S(2).is_constant() + True + >>> Sum(x, (x, 1, 10)).is_constant() + True + >>> Sum(x, (x, 1, n)).is_constant() + False + >>> Sum(x, (x, 1, n)).is_constant(y) + True + >>> Sum(x, (x, 1, n)).is_constant(n) + False + >>> Sum(x, (x, 1, n)).is_constant(x) + True + >>> eq = a*cos(x)**2 + a*sin(x)**2 - a + >>> eq.is_constant() + True + >>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 + True + + >>> (0**x).is_constant() + False + >>> x.is_constant() + False + >>> (x**x).is_constant() + False + >>> one = cos(x)**2 + sin(x)**2 + >>> one.is_constant() + True + >>> ((one - 1)**(x + 1)).is_constant() in (True, False) # could be 0 or 1 + True + """ + + simplify = flags.get('simplify', True) + + if self.is_number: + return True + free = self.free_symbols + if not free: + return True # assume f(1) is some constant + + # if we are only interested in some symbols and they are not in the + # free symbols then this expression is constant wrt those symbols + wrt = set(wrt) + if wrt and not wrt & free: + return True + wrt = wrt or free + + # simplify unless this has already been done + expr = self + if simplify: + expr = expr.simplify() + + # is_zero should be a quick assumptions check; it can be wrong for + # numbers (see test_is_not_constant test), giving False when it + # shouldn't, but hopefully it will never give True unless it is sure. + if expr.is_zero: + return True + + # Don't attempt substitution or differentiation with non-number symbols + wrt_number = {sym for sym in wrt if sym.kind is NumberKind} + + # try numerical evaluation to see if we get two different values + failing_number = None + if wrt_number == free: + # try 0 (for a) and 1 (for b) + try: + a = expr.subs(list(zip(free, [0]*len(free))), + simultaneous=True) + if a is S.NaN: + # evaluation may succeed when substitution fails + a = expr._random(None, 0, 0, 0, 0) + except ZeroDivisionError: + a = None + if a is not None and a is not S.NaN: + try: + b = expr.subs(list(zip(free, [1]*len(free))), + simultaneous=True) + if b is S.NaN: + # evaluation may succeed when substitution fails + b = expr._random(None, 1, 0, 1, 0) + except ZeroDivisionError: + b = None + if b is not None and b is not S.NaN and b.equals(a) is False: + return False + # try random real + b = expr._random(None, -1, 0, 1, 0) + if b is not None and b is not S.NaN and b.equals(a) is False: + return False + # try random complex + b = expr._random() + if b is not None and b is not S.NaN: + if b.equals(a) is False: + return False + failing_number = a if a.is_number else b + + # now we will test each wrt symbol (or all free symbols) to see if the + # expression depends on them or not using differentiation. This is + # not sufficient for all expressions, however, so we don't return + # False if we get a derivative other than 0 with free symbols. + for w in wrt_number: + deriv = expr.diff(w) + if simplify: + deriv = deriv.simplify() + if deriv != 0: + if not (pure_complex(deriv, or_real=True)): + if flags.get('failing_number', False): + return failing_number + return False + from sympy.solvers.solvers import denoms + return fuzzy_not(fuzzy_or(den.is_zero for den in denoms(self))) + + def equals(self, other, failing_expression=False): + """Return True if self == other, False if it does not, or None. If + failing_expression is True then the expression which did not simplify + to a 0 will be returned instead of None. + + Explanation + =========== + + If ``self`` is a Number (or complex number) that is not zero, then + the result is False. + + If ``self`` is a number and has not evaluated to zero, evalf will be + used to test whether the expression evaluates to zero. If it does so + and the result has significance (i.e. the precision is either -1, for + a Rational result, or is greater than 1) then the evalf value will be + used to return True or False. + + """ + from sympy.simplify.simplify import nsimplify, simplify + from sympy.solvers.solvers import solve + from sympy.polys.polyerrors import NotAlgebraic + from sympy.polys.numberfields import minimal_polynomial + + other = sympify(other) + + if not isinstance(other, Expr): + return False + + if self == other: + return True + + # they aren't the same so see if we can make the difference 0; + # don't worry about doing simplification steps one at a time + # because if the expression ever goes to 0 then the subsequent + # simplification steps that are done will be very fast. + diff = factor_terms(simplify(self - other), radical=True) + + if not diff: + return True + + if not diff.has(Add, Mod): + # if there is no expanding to be done after simplifying + # then this can't be a zero + return False + + factors = diff.as_coeff_mul()[1] + if len(factors) > 1: # avoid infinity recursion + fac_zero = [fac.equals(0) for fac in factors] + if None not in fac_zero: # every part can be decided + return any(fac_zero) + + constant = diff.is_constant(simplify=False, failing_number=True) + + if constant is False: + return False + + if not diff.is_number: + if constant is None: + # e.g. unless the right simplification is done, a symbolic + # zero is possible (see expression of issue 6829: without + # simplification constant will be None). + return + + if constant is True: + # this gives a number whether there are free symbols or not + ndiff = diff._random() + # is_comparable will work whether the result is real + # or complex; it could be None, however. + if ndiff and ndiff.is_comparable: + return False + + # sometimes we can use a simplified result to give a clue as to + # what the expression should be; if the expression is *not* zero + # then we should have been able to compute that and so now + # we can just consider the cases where the approximation appears + # to be zero -- we try to prove it via minimal_polynomial. + # + # removed + # ns = nsimplify(diff) + # if diff.is_number and (not ns or ns == diff): + # + # The thought was that if it nsimplifies to 0 that's a sure sign + # to try the following to prove it; or if it changed but wasn't + # zero that might be a sign that it's not going to be easy to + # prove. But tests seem to be working without that logic. + # + if diff.is_number: + # try to prove via self-consistency + surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer] + # it seems to work better to try big ones first + surds.sort(key=lambda x: -x.args[0]) + for s in surds: + try: + # simplify is False here -- this expression has already + # been identified as being hard to identify as zero; + # we will handle the checking ourselves using nsimplify + # to see if we are in the right ballpark or not and if so + # *then* the simplification will be attempted. + sol = solve(diff, s, simplify=False) + if sol: + if s in sol: + # the self-consistent result is present + return True + if all(si.is_Integer for si in sol): + # perfect powers are removed at instantiation + # so surd s cannot be an integer + return False + if all(i.is_algebraic is False for i in sol): + # a surd is algebraic + return False + if any(si in surds for si in sol): + # it wasn't equal to s but it is in surds + # and different surds are not equal + return False + if any(nsimplify(s - si) == 0 and + simplify(s - si) == 0 for si in sol): + return True + if s.is_real: + if any(nsimplify(si, [s]) == s and simplify(si) == s + for si in sol): + return True + except NotImplementedError: + pass + + # try to prove with minimal_polynomial but know when + # *not* to use this or else it can take a long time. e.g. issue 8354 + if True: # change True to condition that assures non-hang + try: + mp = minimal_polynomial(diff) + if mp.is_Symbol: + return True + return False + except (NotAlgebraic, NotImplementedError): + pass + + # diff has not simplified to zero; constant is either None, True + # or the number with significance (is_comparable) that was randomly + # calculated twice as the same value. + if constant not in (True, None) and constant != 0: + return False + + if failing_expression: + return diff + return None + + def _eval_is_extended_positive_negative(self, positive): + from sympy.polys.numberfields import minimal_polynomial + from sympy.polys.polyerrors import NotAlgebraic + if self.is_number: + # check to see that we can get a value + try: + n2 = self._eval_evalf(2) + # XXX: This shouldn't be caught here + # Catches ValueError: hypsum() failed to converge to the requested + # 34 bits of accuracy + except ValueError: + return None + if n2 is None: + return None + if getattr(n2, '_prec', 1) == 1: # no significance + return None + if n2 is S.NaN: + return None + + f = self.evalf(2) + if f.is_Float: + match = f, S.Zero + else: + match = pure_complex(f) + if match is None: + return False + r, i = match + if not (i.is_Number and r.is_Number): + return False + if r._prec != 1 and i._prec != 1: + return bool(not i and ((r > 0) if positive else (r < 0))) + elif r._prec == 1 and (not i or i._prec == 1) and \ + self._eval_is_algebraic() and not self.has(Function): + try: + if minimal_polynomial(self).is_Symbol: + return False + except (NotAlgebraic, NotImplementedError): + pass + + def _eval_is_extended_positive(self): + return self._eval_is_extended_positive_negative(positive=True) + + def _eval_is_extended_negative(self): + return self._eval_is_extended_positive_negative(positive=False) + + def _eval_interval(self, x, a, b): + """ + Returns evaluation over an interval. For most functions this is: + + self.subs(x, b) - self.subs(x, a), + + possibly using limit() if NaN is returned from subs, or if + singularities are found between a and b. + + If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x), + respectively. + + """ + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.exponential import log + from sympy.series.limits import limit, Limit + from sympy.sets.sets import Interval + from sympy.solvers.solveset import solveset + + if (a is None and b is None): + raise ValueError('Both interval ends cannot be None.') + + def _eval_endpoint(left): + c = a if left else b + if c is None: + return S.Zero + else: + C = self.subs(x, c) + if C.has(S.NaN, S.Infinity, S.NegativeInfinity, + S.ComplexInfinity, AccumBounds): + if (a < b) != False: + C = limit(self, x, c, "+" if left else "-") + else: + C = limit(self, x, c, "-" if left else "+") + + if isinstance(C, Limit): + raise NotImplementedError("Could not compute limit") + return C + + if a == b: + return S.Zero + + A = _eval_endpoint(left=True) + if A is S.NaN: + return A + + B = _eval_endpoint(left=False) + + if (a and b) is None: + return B - A + + value = B - A + + if a.is_comparable and b.is_comparable: + if a < b: + domain = Interval(a, b) + else: + domain = Interval(b, a) + # check the singularities of self within the interval + # if singularities is a ConditionSet (not iterable), catch the exception and pass + singularities = solveset(self.cancel().as_numer_denom()[1], x, + domain=domain) + for logterm in self.atoms(log): + singularities = singularities | solveset(logterm.args[0], x, + domain=domain) + try: + for s in singularities: + if value is S.NaN: + # no need to keep adding, it will stay NaN + break + if not s.is_comparable: + continue + if (a < s) == (s < b) == True: + value += -limit(self, x, s, "+") + limit(self, x, s, "-") + elif (b < s) == (s < a) == True: + value += limit(self, x, s, "+") - limit(self, x, s, "-") + except TypeError: + pass + + return value + + def _eval_power(self, expt) -> Expr | None: + # subclass to compute self**other for cases when + # other is not NaN, 0, or 1 + return None + + def _eval_conjugate(self): + if self.is_extended_real: + return self + elif self.is_imaginary: + return -self + + def conjugate(self): + """Returns the complex conjugate of 'self'.""" + from sympy.functions.elementary.complexes import conjugate as c + return c(self) + + def dir(self, x, cdir): + if self.is_zero: + return S.Zero + from sympy.functions.elementary.exponential import log + minexp = S.Zero + arg = self + while arg: + minexp += S.One + arg = arg.diff(x) + coeff = arg.subs(x, 0) + if coeff is S.NaN: + coeff = arg.limit(x, 0) + if coeff is S.ComplexInfinity: + try: + coeff, _ = arg.leadterm(x) + if coeff.has(log(x)): + raise ValueError() + except ValueError: + coeff = arg.limit(x, 0) + if coeff != S.Zero: + break + return coeff*cdir**minexp + + def _eval_transpose(self): + from sympy.functions.elementary.complexes import conjugate + if self.is_commutative: + return self + elif self.is_hermitian: + return conjugate(self) + elif self.is_antihermitian: + return -conjugate(self) + + def transpose(self): + from sympy.functions.elementary.complexes import transpose + return transpose(self) + + def _eval_adjoint(self): + from sympy.functions.elementary.complexes import conjugate, transpose + if self.is_hermitian: + return self + elif self.is_antihermitian: + return -self + obj = self._eval_conjugate() + if obj is not None: + return transpose(obj) + obj = self._eval_transpose() + if obj is not None: + return conjugate(obj) + + def adjoint(self): + from sympy.functions.elementary.complexes import adjoint + return adjoint(self) + + @classmethod + def _parse_order(cls, order): + """Parse and configure the ordering of terms. """ + from sympy.polys.orderings import monomial_key + + startswith = getattr(order, "startswith", None) + if startswith is None: + reverse = False + else: + reverse = startswith('rev-') + if reverse: + order = order[4:] + + monom_key = monomial_key(order) + + def neg(monom): + return tuple([neg(m) if isinstance(m, tuple) else -m for m in monom]) + + def key(term): + _, ((re, im), monom, ncpart) = term + + monom = neg(monom_key(monom)) + ncpart = tuple([e.sort_key(order=order) for e in ncpart]) + coeff = ((bool(im), im), (re, im)) + + return monom, ncpart, coeff + + return key, reverse + + def as_ordered_factors(self, order=None): + """Return list of ordered factors (if Mul) else [self].""" + return [self] + + def as_poly(self, *gens, **args): + """Converts ``self`` to a polynomial or returns ``None``. + + Explanation + =========== + + >>> from sympy import sin + >>> from sympy.abc import x, y + + >>> print((x**2 + x*y).as_poly()) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + x*y).as_poly(x, y)) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + sin(y)).as_poly(x, y)) + None + + """ + from sympy.polys.polyerrors import PolynomialError, GeneratorsNeeded + from sympy.polys.polytools import Poly + + try: + poly = Poly(self, *gens, **args) + + if not poly.is_Poly: + return None + else: + return poly + except (PolynomialError, GeneratorsNeeded): + # PolynomialError is caught for e.g. exp(x).as_poly(x) + # GeneratorsNeeded is caught for e.g. S(2).as_poly() + return None + + def as_ordered_terms(self, order=None, data=False): + """ + Transform an expression to an ordered list of terms. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x + + >>> (sin(x)**2*cos(x) + sin(x)**2 + 1).as_ordered_terms() + [sin(x)**2*cos(x), sin(x)**2, 1] + + """ + + from .numbers import Number, NumberSymbol + + if order is None and self.is_Add: + # Spot the special case of Add(Number, Mul(Number, expr)) with the + # first number positive and the second number negative + key = lambda x:not isinstance(x, (Number, NumberSymbol)) + add_args = sorted(Add.make_args(self), key=key) + if (len(add_args) == 2 + and isinstance(add_args[0], (Number, NumberSymbol)) + and isinstance(add_args[1], Mul)): + mul_args = sorted(Mul.make_args(add_args[1]), key=key) + if (len(mul_args) == 2 + and isinstance(mul_args[0], Number) + and add_args[0].is_positive + and mul_args[0].is_negative): + return add_args + + key, reverse = self._parse_order(order) + terms, gens = self.as_terms() + + if not any(term.is_Order for term, _ in terms): + ordered = sorted(terms, key=key, reverse=reverse) + else: + _terms, _order = [], [] + + for term, repr in terms: + if not term.is_Order: + _terms.append((term, repr)) + else: + _order.append((term, repr)) + + ordered = sorted(_terms, key=key, reverse=True) \ + + sorted(_order, key=key, reverse=True) + + if data: + return ordered, gens + else: + return [term for term, _ in ordered] + + def as_terms(self): + """Transform an expression to a list of terms. """ + from .exprtools import decompose_power + + gens, terms = set(), [] + + for term in Add.make_args(self): + coeff, _term = term.as_coeff_Mul() + + coeff = complex(coeff) + cpart, ncpart = {}, [] + + if _term is not S.One: + for factor in Mul.make_args(_term): + if factor.is_number: + try: + coeff *= complex(factor) + except (TypeError, ValueError): + pass + else: + continue + + if factor.is_commutative: + base, exp = decompose_power(factor) + + cpart[base] = exp + gens.add(base) + else: + ncpart.append(factor) + + coeff = coeff.real, coeff.imag + ncpart = tuple(ncpart) + + terms.append((term, (coeff, cpart, ncpart))) + + gens = sorted(gens, key=default_sort_key) + + k, indices = len(gens), {} + + for i, g in enumerate(gens): + indices[g] = i + + result = [] + + for term, (coeff, cpart, ncpart) in terms: + monom = [0]*k + + for base, exp in cpart.items(): + monom[indices[base]] = exp + + result.append((term, (coeff, tuple(monom), ncpart))) + + return result, gens + + def removeO(self) -> Expr: + """Removes the additive O(..) symbol if there is one""" + return self + + def getO(self) -> Expr | None: + """Returns the additive O(..) symbol if there is one, else None.""" + return None + + def getn(self): + """ + Returns the order of the expression. + + Explanation + =========== + + The order is determined either from the O(...) term. If there + is no O(...) term, it returns None. + + Examples + ======== + + >>> from sympy import O + >>> from sympy.abc import x + >>> (1 + x + O(x**2)).getn() + 2 + >>> (1 + x).getn() + + """ + o = self.getO() + if o is None: + return None + elif o.is_Order: + o = o.expr + if o is S.One: + return S.Zero + if o.is_Symbol: + return S.One + if o.is_Pow: + return o.args[1] + if o.is_Mul: # x**n*log(x)**n or x**n/log(x)**n + for oi in o.args: + if oi.is_Symbol: + return S.One + if oi.is_Pow: + from .symbol import Dummy, Symbol + syms = oi.atoms(Symbol) + if len(syms) == 1: + x = syms.pop() + oi = oi.subs(x, Dummy('x', positive=True)) + if oi.base.is_Symbol and oi.exp.is_Rational: + return abs(oi.exp) + + raise NotImplementedError('not sure of order of %s' % o) + + def count_ops(self, visual=False): + from .function import count_ops + return count_ops(self, visual) + + def args_cnc(self, cset=False, warn=True, split_1=True): + """Return [commutative factors, non-commutative factors] of self. + + Explanation + =========== + + self is treated as a Mul and the ordering of the factors is maintained. + If ``cset`` is True the commutative factors will be returned in a set. + If there were repeated factors (as may happen with an unevaluated Mul) + then an error will be raised unless it is explicitly suppressed by + setting ``warn`` to False. + + Note: -1 is always separated from a Number unless split_1 is False. + + Examples + ======== + + >>> from sympy import symbols, oo + >>> A, B = symbols('A B', commutative=0) + >>> x, y = symbols('x y') + >>> (-2*x*y).args_cnc() + [[-1, 2, x, y], []] + >>> (-2.5*x).args_cnc() + [[-1, 2.5, x], []] + >>> (-2*x*A*B*y).args_cnc() + [[-1, 2, x, y], [A, B]] + >>> (-2*x*A*B*y).args_cnc(split_1=False) + [[-2, x, y], [A, B]] + >>> (-2*x*y).args_cnc(cset=True) + [{-1, 2, x, y}, []] + + The arg is always treated as a Mul: + + >>> (-2 + x + A).args_cnc() + [[], [x - 2 + A]] + >>> (-oo).args_cnc() # -oo is a singleton + [[-1, oo], []] + """ + args = list(Mul.make_args(self)) + + for i, mi in enumerate(args): + if not mi.is_commutative: + c = args[:i] + nc = args[i:] + break + else: + c = args + nc = [] + + if c and split_1 and ( + c[0].is_Number and + c[0].is_extended_negative and + c[0] is not S.NegativeOne): + c[:1] = [S.NegativeOne, -c[0]] + + if cset: + clen = len(c) + c = set(c) + if clen and warn and len(c) != clen: + raise ValueError('repeated commutative arguments: %s' % + [ci for ci in c if list(self.args).count(ci) > 1]) + return [c, nc] + + def coeff(self, x: Expr, n=1, right=False, _first=True): + """ + Returns the coefficient from the term(s) containing ``x**n``. If ``n`` + is zero then all terms independent of ``x`` will be returned. + + Explanation + =========== + + When ``x`` is noncommutative, the coefficient to the left (default) or + right of ``x`` can be returned. The keyword 'right' is ignored when + ``x`` is commutative. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.abc import x, y, z + + You can select terms that have an explicit negative in front of them: + + >>> (-x + 2*y).coeff(-1) + x + >>> (x - 2*y).coeff(-1) + 2*y + + You can select terms with no Rational coefficient: + + >>> (x + 2*y).coeff(1) + x + >>> (3 + 2*x + 4*x**2).coeff(1) + 0 + + You can select terms independent of x by making n=0; in this case + expr.as_independent(x)[0] is returned (and 0 will be returned instead + of None): + + >>> (3 + 2*x + 4*x**2).coeff(x, 0) + 3 + >>> eq = ((x + 1)**3).expand() + 1 + >>> eq + x**3 + 3*x**2 + 3*x + 2 + >>> [eq.coeff(x, i) for i in reversed(range(4))] + [1, 3, 3, 2] + >>> eq -= 2 + >>> [eq.coeff(x, i) for i in reversed(range(4))] + [1, 3, 3, 0] + + You can select terms that have a numerical term in front of them: + + >>> (-x - 2*y).coeff(2) + -y + >>> from sympy import sqrt + >>> (x + sqrt(2)*x).coeff(sqrt(2)) + x + + The matching is exact: + + >>> (3 + 2*x + 4*x**2).coeff(x) + 2 + >>> (3 + 2*x + 4*x**2).coeff(x**2) + 4 + >>> (3 + 2*x + 4*x**2).coeff(x**3) + 0 + >>> (z*(x + y)**2).coeff((x + y)**2) + z + >>> (z*(x + y)**2).coeff(x + y) + 0 + + In addition, no factoring is done, so 1 + z*(1 + y) is not obtained + from the following: + + >>> (x + z*(x + x*y)).coeff(x) + 1 + + If such factoring is desired, factor_terms can be used first: + + >>> from sympy import factor_terms + >>> factor_terms(x + z*(x + x*y)).coeff(x) + z*(y + 1) + 1 + + >>> n, m, o = symbols('n m o', commutative=False) + >>> n.coeff(n) + 1 + >>> (3*n).coeff(n) + 3 + >>> (n*m + m*n*m).coeff(n) # = (1 + m)*n*m + 1 + m + >>> (n*m + m*n*m).coeff(n, right=True) # = (1 + m)*n*m + m + + If there is more than one possible coefficient 0 is returned: + + >>> (n*m + m*n).coeff(n) + 0 + + If there is only one possible coefficient, it is returned: + + >>> (n*m + x*m*n).coeff(m*n) + x + >>> (n*m + x*m*n).coeff(m*n, right=1) + 1 + + See Also + ======== + + as_coefficient: separate the expression into a coefficient and factor + as_coeff_Add: separate the additive constant from an expression + as_coeff_Mul: separate the multiplicative constant from an expression + as_independent: separate x-dependent terms/factors from others + sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly + sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used + """ + x = sympify(x) + if not isinstance(x, Basic): + return S.Zero + + n = as_int(n) + + if not x: + return S.Zero + + if x == self: + if n == 1: + return S.One + return S.Zero + + co2: list[Expr] + + if x is S.One: + co2 = [a for a in Add.make_args(self) if a.as_coeff_Mul()[0] is S.One] + if not co2: + return S.Zero + return Add(*co2) + + if n == 0: + if x.is_Add and self.is_Add: + c = self.coeff(x, right=right) + if not c: + return S.Zero + if not right: + return self - Add(*[a*x for a in Add.make_args(c)]) + return self - Add(*[x*a for a in Add.make_args(c)]) + return self.as_independent(x, as_Add=True)[0] + + # continue with the full method, looking for this power of x: + x = x**n + + def incommon(l1, l2): + if not l1 or not l2: + return [] + n = min(len(l1), len(l2)) + for i in range(n): + if l1[i] != l2[i]: + return l1[:i] + return l1[:] + + def find(l, sub, first=True): + """ Find where list sub appears in list l. When ``first`` is True + the first occurrence from the left is returned, else the last + occurrence is returned. Return None if sub is not in l. + + Examples + ======== + + >> l = range(5)*2 + >> find(l, [2, 3]) + 2 + >> find(l, [2, 3], first=0) + 7 + >> find(l, [2, 4]) + None + + """ + if not sub or not l or len(sub) > len(l): + return None + n = len(sub) + if not first: + l.reverse() + sub.reverse() + for i in range(len(l) - n + 1): + if all(l[i + j] == sub[j] for j in range(n)): + break + else: + i = None + if not first: + l.reverse() + sub.reverse() + if i is not None and not first: + i = len(l) - (i + n) + return i + + co2 = [] + co: list[tuple[set[Expr], list[Expr]]] = [] + args = Add.make_args(self) + self_c = self.is_commutative + x_c = x.is_commutative + if self_c and not x_c: + return S.Zero + if _first and self.is_Add and not self_c and not x_c: + # get the part that depends on x exactly + xargs = Mul.make_args(x) + d = Add(*[i for i in Add.make_args(self.as_independent(x)[1]) + if all(xi in Mul.make_args(i) for xi in xargs)]) + rv = d.coeff(x, right=right, _first=False) + if not rv.is_Add or not right: + return rv + c_part, nc_part = zip(*[i.args_cnc() for i in rv.args]) + if has_variety(c_part): + return rv + return Add(*[Mul._from_args(i) for i in nc_part]) + + one_c = self_c or x_c + xargs, nx = x.args_cnc(cset=True, warn=bool(not x_c)) + # find the parts that pass the commutative terms + for a in args: + margs, nc = a.args_cnc(cset=True, warn=bool(not self_c)) + if nc is None: + nc = [] + if len(xargs) > len(margs): + continue + resid = margs.difference(xargs) + if len(resid) + len(xargs) == len(margs): + if one_c: + co2.append(Mul(*(list(resid) + nc))) + else: + co.append((resid, nc)) + if one_c: + if co2 == []: + return S.Zero + elif co2: + return Add(*co2) + else: # both nc + # now check the non-comm parts + if not co: + return S.Zero + if all(n == co[0][1] for r, n in co): + ii = find(co[0][1], nx, right) + if ii is not None: + if not right: + return Mul(Add(*[Mul(*r) for r, c in co]), Mul(*co[0][1][:ii])) + else: + return Mul(*co[0][1][ii + len(nx):]) + beg = reduce(incommon, (n[1] for n in co)) + if beg: + ii = find(beg, nx, right) + if ii is not None: + if not right: + gcdc = co[0][0] + for i in range(1, len(co)): + gcdc = gcdc.intersection(co[i][0]) + if not gcdc: + break + return Mul(*(list(gcdc) + beg[:ii])) + else: + m = ii + len(nx) + return Add(*[Mul(*(list(r) + n[m:])) for r, n in co]) + end = list(reversed( + reduce(incommon, (list(reversed(n[1])) for n in co)))) + if end: + ii = find(end, nx, right) + if ii is not None: + if not right: + return Add(*[Mul(*(list(r) + n[:-len(end) + ii])) for r, n in co]) + else: + return Mul(*end[ii + len(nx):]) + # look for single match + hit = None + for i, (r, n) in enumerate(co): + ii = find(n, nx, right) + if ii is not None: + if not hit: + hit = ii, r, n + else: + break + else: + if hit: + ii, r, n = hit + if not right: + return Mul(*(list(r) + n[:ii])) + else: + return Mul(*n[ii + len(nx):]) + + return S.Zero + + def as_expr(self, *gens): + """ + Convert a polynomial to a SymPy expression. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x, y + + >>> f = (x**2 + x*y).as_poly(x, y) + >>> f.as_expr() + x**2 + x*y + + >>> sin(x).as_expr() + sin(x) + + """ + return self + + def as_coefficient(self, expr: Expr) -> Expr | None: + """ + Extracts symbolic coefficient at the given expression. In + other words, this functions separates 'self' into the product + of 'expr' and 'expr'-free coefficient. If such separation + is not possible it will return None. + + Examples + ======== + + >>> from sympy import E, pi, sin, I, Poly + >>> from sympy.abc import x + + >>> E.as_coefficient(E) + 1 + >>> (2*E).as_coefficient(E) + 2 + >>> (2*sin(E)*E).as_coefficient(E) + + Two terms have E in them so a sum is returned. (If one were + desiring the coefficient of the term exactly matching E then + the constant from the returned expression could be selected. + Or, for greater precision, a method of Poly can be used to + indicate the desired term from which the coefficient is + desired.) + + >>> (2*E + x*E).as_coefficient(E) + x + 2 + >>> _.args[0] # just want the exact match + 2 + >>> p = Poly(2*E + x*E); p + Poly(x*E + 2*E, x, E, domain='ZZ') + >>> p.coeff_monomial(E) + 2 + >>> p.nth(0, 1) + 2 + + Since the following cannot be written as a product containing + E as a factor, None is returned. (If the coefficient ``2*x`` is + desired then the ``coeff`` method should be used.) + + >>> (2*E*x + x).as_coefficient(E) + >>> (2*E*x + x).coeff(E) + 2*x + + >>> (E*(x + 1) + x).as_coefficient(E) + + >>> (2*pi*I).as_coefficient(pi*I) + 2 + >>> (2*I).as_coefficient(pi*I) + + See Also + ======== + + coeff: return sum of terms have a given factor + as_coeff_Add: separate the additive constant from an expression + as_coeff_Mul: separate the multiplicative constant from an expression + as_independent: separate x-dependent terms/factors from others + sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly + sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used + + + """ + + r = self.extract_multiplicatively(expr) + if r and not r.has(expr): + return r + else: + return None + + def as_independent(self, *deps, **hint) -> tuple[Expr, Expr]: + """ + A mostly naive separation of a Mul or Add into arguments that are not + are dependent on deps. To obtain as complete a separation of variables + as possible, use a separation method first, e.g.: + + * separatevars() to change Mul, Add and Pow (including exp) into Mul + * .expand(mul=True) to change Add or Mul into Add + * .expand(log=True) to change log expr into an Add + + The only non-naive thing that is done here is to respect noncommutative + ordering of variables and to always return (0, 0) for `self` of zero + regardless of hints. + + For nonzero `self`, the returned tuple (i, d) has the + following interpretation: + + * i will has no variable that appears in deps + * d will either have terms that contain variables that are in deps, or + be equal to 0 (when self is an Add) or 1 (when self is a Mul) + * if self is an Add then self = i + d + * if self is a Mul then self = i*d + * otherwise (self, S.One) or (S.One, self) is returned. + + To force the expression to be treated as an Add, use the hint as_Add=True + + Examples + ======== + + -- self is an Add + + >>> from sympy import sin, cos, exp + >>> from sympy.abc import x, y, z + + >>> (x + x*y).as_independent(x) + (0, x*y + x) + >>> (x + x*y).as_independent(y) + (x, x*y) + >>> (2*x*sin(x) + y + x + z).as_independent(x) + (y + z, 2*x*sin(x) + x) + >>> (2*x*sin(x) + y + x + z).as_independent(x, y) + (z, 2*x*sin(x) + x + y) + + -- self is a Mul + + >>> (x*sin(x)*cos(y)).as_independent(x) + (cos(y), x*sin(x)) + + non-commutative terms cannot always be separated out when self is a Mul + + >>> from sympy import symbols + >>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False) + >>> (n1 + n1*n2).as_independent(n2) + (n1, n1*n2) + >>> (n2*n1 + n1*n2).as_independent(n2) + (0, n1*n2 + n2*n1) + >>> (n1*n2*n3).as_independent(n1) + (1, n1*n2*n3) + >>> (n1*n2*n3).as_independent(n2) + (n1, n2*n3) + >>> ((x-n1)*(x-y)).as_independent(x) + (1, (x - y)*(x - n1)) + + -- self is anything else: + + >>> (sin(x)).as_independent(x) + (1, sin(x)) + >>> (sin(x)).as_independent(y) + (sin(x), 1) + >>> exp(x+y).as_independent(x) + (1, exp(x + y)) + + -- force self to be treated as an Add: + + >>> (3*x).as_independent(x, as_Add=True) + (0, 3*x) + + -- force self to be treated as a Mul: + + >>> (3+x).as_independent(x, as_Add=False) + (1, x + 3) + >>> (-3+x).as_independent(x, as_Add=False) + (1, x - 3) + + Note how the below differs from the above in making the + constant on the dep term positive. + + >>> (y*(-3+x)).as_independent(x) + (y, x - 3) + + -- use .as_independent() for true independence testing instead + of .has(). The former considers only symbols in the free + symbols while the latter considers all symbols + + >>> from sympy import Integral + >>> I = Integral(x, (x, 1, 2)) + >>> I.has(x) + True + >>> x in I.free_symbols + False + >>> I.as_independent(x) == (I, 1) + True + >>> (I + x).as_independent(x) == (I, x) + True + + Note: when trying to get independent terms, a separation method + might need to be used first. In this case, it is important to keep + track of what you send to this routine so you know how to interpret + the returned values + + >>> from sympy import separatevars, log + >>> separatevars(exp(x+y)).as_independent(x) + (exp(y), exp(x)) + >>> (x + x*y).as_independent(y) + (x, x*y) + >>> separatevars(x + x*y).as_independent(y) + (x, y + 1) + >>> (x*(1 + y)).as_independent(y) + (x, y + 1) + >>> (x*(1 + y)).expand(mul=True).as_independent(y) + (x, x*y) + >>> a, b=symbols('a b', positive=True) + >>> (log(a*b).expand(log=True)).as_independent(b) + (log(a), log(b)) + + See Also + ======== + + separatevars + expand_log + sympy.core.add.Add.as_two_terms + sympy.core.mul.Mul.as_two_terms + as_coeff_mul + """ + from .symbol import Symbol + from .add import _unevaluated_Add + from .mul import _unevaluated_Mul + + if self is S.Zero: + return (self, self) + + func = self.func + want: type[Add] | type[Mul] + if hint.get('as_Add', isinstance(self, Add) ): + want = Add + else: + want = Mul + + # sift out deps into symbolic and other and ignore + # all symbols but those that are in the free symbols + sym = set() + other = [] + for d in deps: + if isinstance(d, Symbol): # Symbol.is_Symbol is True + sym.add(d) + else: + other.append(d) + + def has(e): + """return the standard has() if there are no literal symbols, else + check to see that symbol-deps are in the free symbols.""" + has_other = e.has(*other) + if not sym: + return has_other + return has_other or e.has(*(e.free_symbols & sym)) + + if (want is not func or + func is not Add and func is not Mul): + if has(self): + return (want.identity, self) + else: + return (self, want.identity) + else: + if func is Add: + args = list(self.args) + else: + args, nc = self.args_cnc() + + d = sift(args, has) + depend = d[True] + indep = d[False] + if func is Add: # all terms were treated as commutative + return (Add(*indep), _unevaluated_Add(*depend)) + else: # handle noncommutative by stopping at first dependent term + for i, n in enumerate(nc): + if has(n): + depend.extend(nc[i:]) + break + indep.append(n) + return Mul(*indep), _unevaluated_Mul(*depend) + + def as_real_imag(self, deep=True, **hints) -> tuple[Expr, Expr]: + """Performs complex expansion on 'self' and returns a tuple + containing collected both real and imaginary parts. This + method cannot be confused with re() and im() functions, + which does not perform complex expansion at evaluation. + + However it is possible to expand both re() and im() + functions and get exactly the same results as with + a single call to this function. + + >>> from sympy import symbols, I + + >>> x, y = symbols('x,y', real=True) + + >>> (x + y*I).as_real_imag() + (x, y) + + >>> from sympy.abc import z, w + + >>> (z + w*I).as_real_imag() + (re(z) - im(w), re(w) + im(z)) + + """ + if hints.get('ignore') == self: + return None # type: ignore + else: + from sympy.functions.elementary.complexes import im, re + return (re(self), im(self)) + + def as_powers_dict(self): + """Return self as a dictionary of factors with each factor being + treated as a power. The keys are the bases of the factors and the + values, the corresponding exponents. The resulting dictionary should + be used with caution if the expression is a Mul and contains non- + commutative factors since the order that they appeared will be lost in + the dictionary. + + See Also + ======== + as_ordered_factors: An alternative for noncommutative applications, + returning an ordered list of factors. + args_cnc: Similar to as_ordered_factors, but guarantees separation + of commutative and noncommutative factors. + """ + d = defaultdict(int) + d.update([self.as_base_exp()]) + return d + + def as_coefficients_dict(self, *syms): + """Return a dictionary mapping terms to their Rational coefficient. + Since the dictionary is a defaultdict, inquiries about terms which + were not present will return a coefficient of 0. + + If symbols ``syms`` are provided, any multiplicative terms + independent of them will be considered a coefficient and a + regular dictionary of syms-dependent generators as keys and + their corresponding coefficients as values will be returned. + + Examples + ======== + + >>> from sympy.abc import a, x, y + >>> (3*x + a*x + 4).as_coefficients_dict() + {1: 4, x: 3, a*x: 1} + >>> _[a] + 0 + >>> (3*a*x).as_coefficients_dict() + {a*x: 3} + >>> (3*a*x).as_coefficients_dict(x) + {x: 3*a} + >>> (3*a*x).as_coefficients_dict(y) + {1: 3*a*x} + + """ + d = defaultdict(list) + if not syms: + for ai in Add.make_args(self): + c, m = ai.as_coeff_Mul() + d[m].append(c) + for k, v in d.items(): + if len(v) == 1: + d[k] = v[0] + else: + d[k] = Add(*v) + else: + ind, dep = self.as_independent(*syms, as_Add=True) + for i in Add.make_args(dep): + if i.is_Mul: + c, x = i.as_coeff_mul(*syms) + if c is S.One: + d[i].append(c) + else: + d[i._new_rawargs(*x)].append(c) + elif i: + d[i].append(S.One) + d = {k: Add(*d[k]) for k in d} + if ind is not S.Zero: + d.update({S.One: ind}) + di = defaultdict(int) + di.update(d) + return di + + def as_base_exp(self) -> tuple[Expr, Expr]: + # a -> b ** e + return self, S.One + + def as_coeff_mul(self, *deps, **kwargs) -> tuple[Expr, tuple[Expr, ...]]: + """Return the tuple (c, args) where self is written as a Mul, ``m``. + + c should be a Rational multiplied by any factors of the Mul that are + independent of deps. + + args should be a tuple of all other factors of m; args is empty + if self is a Number or if self is independent of deps (when given). + + This should be used when you do not know if self is a Mul or not but + you want to treat self as a Mul or if you want to process the + individual arguments of the tail of self as a Mul. + + - if you know self is a Mul and want only the head, use self.args[0]; + - if you do not want to process the arguments of the tail but need the + tail then use self.as_two_terms() which gives the head and tail; + - if you want to split self into an independent and dependent parts + use ``self.as_independent(*deps)`` + + >>> from sympy import S + >>> from sympy.abc import x, y + >>> (S(3)).as_coeff_mul() + (3, ()) + >>> (3*x*y).as_coeff_mul() + (3, (x, y)) + >>> (3*x*y).as_coeff_mul(x) + (3*y, (x,)) + >>> (3*y).as_coeff_mul(x) + (3*y, ()) + """ + if deps: + if not self.has(*deps): + return self, () + return S.One, (self,) + + def as_coeff_add(self, *deps) -> tuple[Expr, tuple[Expr, ...]]: + """Return the tuple (c, args) where self is written as an Add, ``a``. + + c should be a Rational added to any terms of the Add that are + independent of deps. + + args should be a tuple of all other terms of ``a``; args is empty + if self is a Number or if self is independent of deps (when given). + + This should be used when you do not know if self is an Add or not but + you want to treat self as an Add or if you want to process the + individual arguments of the tail of self as an Add. + + - if you know self is an Add and want only the head, use self.args[0]; + - if you do not want to process the arguments of the tail but need the + tail then use self.as_two_terms() which gives the head and tail. + - if you want to split self into an independent and dependent parts + use ``self.as_independent(*deps)`` + + >>> from sympy import S + >>> from sympy.abc import x, y + >>> (S(3)).as_coeff_add() + (3, ()) + >>> (3 + x).as_coeff_add() + (3, (x,)) + >>> (3 + x + y).as_coeff_add(x) + (y + 3, (x,)) + >>> (3 + y).as_coeff_add(x) + (y + 3, ()) + + """ + if deps: + if not self.has_free(*deps): + return self, () + return S.Zero, (self,) + + def primitive(self) -> tuple[Number, Expr]: + """Return the positive Rational that can be extracted non-recursively + from every term of self (i.e., self is treated like an Add). This is + like the as_coeff_Mul() method but primitive always extracts a positive + Rational (never a negative or a Float). + + Examples + ======== + + >>> from sympy.abc import x + >>> (3*(x + 1)**2).primitive() + (3, (x + 1)**2) + >>> a = (6*x + 2); a.primitive() + (2, 3*x + 1) + >>> b = (x/2 + 3); b.primitive() + (1/2, x + 6) + >>> (a*b).primitive() == (1, a*b) + True + """ + if not self: + return S.One, S.Zero + c, r = self.as_coeff_Mul(rational=True) + if c.is_negative: + c, r = -c, -r + return c, r + + def as_content_primitive(self, radical=False, clear=True): + """This method should recursively remove a Rational from all arguments + and return that (content) and the new self (primitive). The content + should always be positive and ``Mul(*foo.as_content_primitive()) == foo``. + The primitive need not be in canonical form and should try to preserve + the underlying structure if possible (i.e. expand_mul should not be + applied to self). + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import x, y, z + + >>> eq = 2 + 2*x + 2*y*(3 + 3*y) + + The as_content_primitive function is recursive and retains structure: + + >>> eq.as_content_primitive() + (2, x + 3*y*(y + 1) + 1) + + Integer powers will have Rationals extracted from the base: + + >>> ((2 + 6*x)**2).as_content_primitive() + (4, (3*x + 1)**2) + >>> ((2 + 6*x)**(2*y)).as_content_primitive() + (1, (2*(3*x + 1))**(2*y)) + + Terms may end up joining once their as_content_primitives are added: + + >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() + (11, x*(y + 1)) + >>> ((3*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() + (9, x*(y + 1)) + >>> ((3*(z*(1 + y)) + 2.0*x*(3 + 3*y))).as_content_primitive() + (1, 6.0*x*(y + 1) + 3*z*(y + 1)) + >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive() + (121, x**2*(y + 1)**2) + >>> ((x*(1 + y) + 0.4*x*(3 + 3*y))**2).as_content_primitive() + (1, 4.84*x**2*(y + 1)**2) + + Radical content can also be factored out of the primitive: + + >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) + (2, sqrt(2)*(1 + 2*sqrt(5))) + + If clear=False (default is True) then content will not be removed + from an Add if it can be distributed to leave one or more + terms with integer coefficients. + + >>> (x/2 + y).as_content_primitive() + (1/2, x + 2*y) + >>> (x/2 + y).as_content_primitive(clear=False) + (1, x/2 + y) + """ + return S.One, self + + def as_numer_denom(self) -> tuple[Expr, Expr]: + """Return the numerator and the denominator of an expression. + + expression -> a/b -> a, b + + This is just a stub that should be defined by + an object's class methods to get anything else. + + See Also + ======== + + normal: return ``a/b`` instead of ``(a, b)`` + + """ + return self, S.One + + def normal(self): + """Return the expression as a fraction. + + expression -> a/b + + See Also + ======== + + as_numer_denom: return ``(a, b)`` instead of ``a/b`` + + """ + from .mul import _unevaluated_Mul + n, d = self.as_numer_denom() + if d is S.One: + return n + if d.is_Number: + return _unevaluated_Mul(n, 1/d) + else: + return n/d + + def extract_multiplicatively(self, c: Expr) -> Expr | None: + """Return None if it's not possible to make self in the form + c * something in a nice way, i.e. preserving the properties + of arguments of self. + + Examples + ======== + + >>> from sympy import symbols, Rational + + >>> x, y = symbols('x,y', real=True) + + >>> ((x*y)**3).extract_multiplicatively(x**2 * y) + x*y**2 + + >>> ((x*y)**3).extract_multiplicatively(x**4 * y) + + >>> (2*x).extract_multiplicatively(2) + x + + >>> (2*x).extract_multiplicatively(3) + + >>> (Rational(1, 2)*x).extract_multiplicatively(3) + x/6 + + """ + from sympy.functions.elementary.exponential import exp + from .add import _unevaluated_Add + c = sympify(c) + if self is S.NaN: + return None + if c is S.One: + return self + elif c == self: + return S.One + + if c.is_Add: + cc, pc = c.primitive() + if cc is not S.One: + c = Mul(cc, pc, evaluate=False) + + if c.is_Mul: + a, b = c.as_two_terms() # type: ignore + x = self.extract_multiplicatively(a) + if x is not None: + return x.extract_multiplicatively(b) + else: + return x + + quotient = self / c + if self.is_Number: + if self is S.Infinity: + if c.is_positive: + return S.Infinity + elif self is S.NegativeInfinity: + if c.is_negative: + return S.Infinity + elif c.is_positive: + return S.NegativeInfinity + elif self is S.ComplexInfinity: + if not c.is_zero: + return S.ComplexInfinity + elif self.is_Integer: + if not quotient.is_Integer: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_Rational: + if not quotient.is_Rational: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_Float: + if not quotient.is_Float: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit: + if quotient.is_Mul and len(quotient.args) == 2: + if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self: + return quotient + elif quotient.is_Integer and c.is_Number: + return quotient + elif self.is_Add: + cs, ps = self.primitive() + # assert cs >= 1 + if c.is_Number and c is not S.NegativeOne: + # assert c != 1 (handled at top) + if cs is not S.One: + if c.is_negative: + xc = cs.extract_multiplicatively(-c) + if xc is not None: + xc = -xc + else: + xc = cs.extract_multiplicatively(c) + if xc is not None: + return xc*ps # rely on 2-arg Mul to restore Add + return None # |c| != 1 can only be extracted from cs + if c == ps: + return cs + # check args of ps + newargs = [] + arg: Expr + for arg in ps.args: # type: ignore + newarg = arg.extract_multiplicatively(c) + if newarg is None: + return None # all or nothing + newargs.append(newarg) + if cs is not S.One: + args = [cs*t for t in newargs] + # args may be in different order + return _unevaluated_Add(*args) + else: + return Add._from_args(newargs) + elif self.is_Mul: + args: list[Expr] = list(self.args) # type: ignore + for i, arg in enumerate(args): + newarg = arg.extract_multiplicatively(c) + if newarg is not None: + args[i] = newarg + return Mul(*args) + elif self.is_Pow or isinstance(self, exp): + sb, se = self.as_base_exp() + cb, ce = c.as_base_exp() + if cb == sb: + new_exp = se.extract_additively(ce) + if new_exp is not None: + return Pow(sb, new_exp) + elif c == sb: + new_exp = se.extract_additively(1) + if new_exp is not None: + return Pow(sb, new_exp) + + return None + + def extract_additively(self, c): + """Return self - c if it's possible to subtract c from self and + make all matching coefficients move towards zero, else return None. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> e = 2*x + 3 + >>> e.extract_additively(x + 1) + x + 2 + >>> e.extract_additively(3*x) + >>> e.extract_additively(4) + >>> (y*(x + 1)).extract_additively(x + 1) + >>> ((x + 1)*(x + 2*y + 1) + 3).extract_additively(x + 1) + (x + 1)*(x + 2*y) + 3 + + See Also + ======== + extract_multiplicatively + coeff + as_coefficient + + """ + + c = sympify(c) + if self is S.NaN: + return None + if c.is_zero: + return self + elif c == self: + return S.Zero + elif self == S.Zero: + return None + + if self.is_Number: + if not c.is_Number: + return None + co = self + diff = co - c + # XXX should we match types? i.e should 3 - .1 succeed? + if (co > 0 and diff >= 0 and diff < co or + co < 0 and diff <= 0 and diff > co): + return diff + return None + + if c.is_Number: + co, t = self.as_coeff_Add() + xa = co.extract_additively(c) + if xa is None: + return None + return xa + t + + # handle the args[0].is_Number case separately + # since we will have trouble looking for the coeff of + # a number. + if c.is_Add and c.args[0].is_Number: + # whole term as a term factor + co = self.coeff(c) + xa0 = (co.extract_additively(1) or 0)*c + if xa0: + diff = self - co*c + return (xa0 + (diff.extract_additively(c) or diff)) or None + # term-wise + h, t = c.as_coeff_Add() + sh, st = self.as_coeff_Add() + xa = sh.extract_additively(h) + if xa is None: + return None + xa2 = st.extract_additively(t) + if xa2 is None: + return None + return xa + xa2 + + # whole term as a term factor + co, diff = _corem(self, c) + xa0 = (co.extract_additively(1) or 0)*c + if xa0: + return (xa0 + (diff.extract_additively(c) or diff)) or None + # term-wise + coeffs = [] + for a in Add.make_args(c): + ac, at = a.as_coeff_Mul() + co = self.coeff(at) + if not co: + return None + coc, cot = co.as_coeff_Add() + xa = coc.extract_additively(ac) + if xa is None: + return None + self -= co*at + coeffs.append((cot + xa)*at) + coeffs.append(self) + return Add(*coeffs) + + @property + def expr_free_symbols(self): + """ + Like ``free_symbols``, but returns the free symbols only if + they are contained in an expression node. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> (x + y).expr_free_symbols # doctest: +SKIP + {x, y} + + If the expression is contained in a non-expression object, do not return + the free symbols. Compare: + + >>> from sympy import Tuple + >>> t = Tuple(x + y) + >>> t.expr_free_symbols # doctest: +SKIP + set() + >>> t.free_symbols + {x, y} + """ + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return {j for i in self.args for j in i.expr_free_symbols} + + def could_extract_minus_sign(self) -> bool: + """Return True if self has -1 as a leading factor or has + more literal negative signs than positive signs in a sum, + otherwise False. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> e = x - y + >>> {i.could_extract_minus_sign() for i in (e, -e)} + {False, True} + + Though the ``y - x`` is considered like ``-(x - y)``, since it + is in a product without a leading factor of -1, the result is + false below: + + >>> (x*(y - x)).could_extract_minus_sign() + False + + To put something in canonical form wrt to sign, use `signsimp`: + + >>> from sympy import signsimp + >>> signsimp(x*(y - x)) + -x*(x - y) + >>> _.could_extract_minus_sign() + True + """ + return False + + def extract_branch_factor(self, allow_half=False): + """ + Try to write self as ``exp_polar(2*pi*I*n)*z`` in a nice way. + Return (z, n). + + >>> from sympy import exp_polar, I, pi + >>> from sympy.abc import x, y + >>> exp_polar(I*pi).extract_branch_factor() + (exp_polar(I*pi), 0) + >>> exp_polar(2*I*pi).extract_branch_factor() + (1, 1) + >>> exp_polar(-pi*I).extract_branch_factor() + (exp_polar(I*pi), -1) + >>> exp_polar(3*pi*I + x).extract_branch_factor() + (exp_polar(x + I*pi), 1) + >>> (y*exp_polar(-5*pi*I)*exp_polar(3*pi*I + 2*pi*x)).extract_branch_factor() + (y*exp_polar(2*pi*x), -1) + >>> exp_polar(-I*pi/2).extract_branch_factor() + (exp_polar(-I*pi/2), 0) + + If allow_half is True, also extract exp_polar(I*pi): + + >>> exp_polar(I*pi).extract_branch_factor(allow_half=True) + (1, 1/2) + >>> exp_polar(2*I*pi).extract_branch_factor(allow_half=True) + (1, 1) + >>> exp_polar(3*I*pi).extract_branch_factor(allow_half=True) + (1, 3/2) + >>> exp_polar(-I*pi).extract_branch_factor(allow_half=True) + (1, -1/2) + """ + from sympy.functions.elementary.exponential import exp_polar + from sympy.functions.elementary.integers import ceiling + + n = S.Zero + res = S.One + args = Mul.make_args(self) + exps = [] + for arg in args: + if isinstance(arg, exp_polar): + exps += [arg.exp] + else: + res *= arg + piimult = S.Zero + extras = [] + + ipi = S.Pi*S.ImaginaryUnit + while exps: + exp = exps.pop() + if exp.is_Add: + exps += exp.args + continue + if exp.is_Mul: + coeff = exp.as_coefficient(ipi) + if coeff is not None: + piimult += coeff + continue + extras += [exp] + if piimult.is_number: + coeff = piimult + tail = () + else: + coeff, tail = piimult.as_coeff_add(*piimult.free_symbols) + # round down to nearest multiple of 2 + branchfact = ceiling(coeff/2 - S.Half)*2 + n += branchfact/2 + c = coeff - branchfact + if allow_half: + nc = c.extract_additively(1) + if nc is not None: + n += S.Half + c = nc + newexp = ipi*Add(*((c, ) + tail)) + Add(*extras) + if newexp != 0: + res *= exp_polar(newexp) + return res, n + + def is_polynomial(self, *syms): + r""" + Return True if self is a polynomial in syms and False otherwise. + + This checks if self is an exact polynomial in syms. This function + returns False for expressions that are "polynomials" with symbolic + exponents. Thus, you should be able to apply polynomial algorithms to + expressions for which this returns True, and Poly(expr, \*syms) should + work if and only if expr.is_polynomial(\*syms) returns True. The + polynomial does not have to be in expanded form. If no symbols are + given, all free symbols in the expression will be used. + + This is not part of the assumptions system. You cannot do + Symbol('z', polynomial=True). + + Examples + ======== + + >>> from sympy import Symbol, Function + >>> x = Symbol('x') + >>> ((x**2 + 1)**4).is_polynomial(x) + True + >>> ((x**2 + 1)**4).is_polynomial() + True + >>> (2**x + 1).is_polynomial(x) + False + >>> (2**x + 1).is_polynomial(2**x) + True + >>> f = Function('f') + >>> (f(x) + 1).is_polynomial(x) + False + >>> (f(x) + 1).is_polynomial(f(x)) + True + >>> (1/f(x) + 1).is_polynomial(f(x)) + False + + >>> n = Symbol('n', nonnegative=True, integer=True) + >>> (x**n + 1).is_polynomial(x) + False + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be a polynomial to + become one. + + >>> from sympy import sqrt, factor, cancel + >>> y = Symbol('y', positive=True) + >>> a = sqrt(y**2 + 2*y + 1) + >>> a.is_polynomial(y) + False + >>> factor(a) + y + 1 + >>> factor(a).is_polynomial(y) + True + + >>> b = (y**2 + 2*y + 1)/(y + 1) + >>> b.is_polynomial(y) + False + >>> cancel(b) + y + 1 + >>> cancel(b).is_polynomial(y) + True + + See also .is_rational_function() + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return True + + return self._eval_is_polynomial(syms) + + def _eval_is_polynomial(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_free(*syms): + # constant polynomial + return True + # subclasses should return True or False + return None + + def is_rational_function(self, *syms): + """ + Test whether function is a ratio of two polynomials in the given + symbols, syms. When syms is not given, all free symbols will be used. + The rational function does not have to be in expanded or in any kind of + canonical form. + + This function returns False for expressions that are "rational + functions" with symbolic exponents. Thus, you should be able to call + .as_numer_denom() and apply polynomial algorithms to the result for + expressions for which this returns True. + + This is not part of the assumptions system. You cannot do + Symbol('z', rational_function=True). + + Examples + ======== + + >>> from sympy import Symbol, sin + >>> from sympy.abc import x, y + + >>> (x/y).is_rational_function() + True + + >>> (x**2).is_rational_function() + True + + >>> (x/sin(y)).is_rational_function(y) + False + + >>> n = Symbol('n', integer=True) + >>> (x**n + 1).is_rational_function(x) + False + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be a rational function + to become one. + + >>> from sympy import sqrt, factor + >>> y = Symbol('y', positive=True) + >>> a = sqrt(y**2 + 2*y + 1)/y + >>> a.is_rational_function(y) + False + >>> factor(a) + (y + 1)/y + >>> factor(a).is_rational_function(y) + True + + See also is_algebraic_expr(). + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return self not in _illegal + + return self._eval_is_rational_function(syms) + + def _eval_is_rational_function(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_xfree(syms): + return True + # subclasses should return True or False + return None + + def is_meromorphic(self, x, a): + """ + This tests whether an expression is meromorphic as + a function of the given symbol ``x`` at the point ``a``. + + This method is intended as a quick test that will return + None if no decision can be made without simplification or + more detailed analysis. + + Examples + ======== + + >>> from sympy import zoo, log, sin, sqrt + >>> from sympy.abc import x + + >>> f = 1/x**2 + 1 - 2*x**3 + >>> f.is_meromorphic(x, 0) + True + >>> f.is_meromorphic(x, 1) + True + >>> f.is_meromorphic(x, zoo) + True + + >>> g = x**log(3) + >>> g.is_meromorphic(x, 0) + False + >>> g.is_meromorphic(x, 1) + True + >>> g.is_meromorphic(x, zoo) + False + + >>> h = sin(1/x)*x**2 + >>> h.is_meromorphic(x, 0) + False + >>> h.is_meromorphic(x, 1) + True + >>> h.is_meromorphic(x, zoo) + True + + Multivalued functions are considered meromorphic when their + branches are meromorphic. Thus most functions are meromorphic + everywhere except at essential singularities and branch points. + In particular, they will be meromorphic also on branch cuts + except at their endpoints. + + >>> log(x).is_meromorphic(x, -1) + True + >>> log(x).is_meromorphic(x, 0) + False + >>> sqrt(x).is_meromorphic(x, -1) + True + >>> sqrt(x).is_meromorphic(x, 0) + False + + """ + if not x.is_symbol: + raise TypeError("{} should be of symbol type".format(x)) + a = sympify(a) + + return self._eval_is_meromorphic(x, a) + + def _eval_is_meromorphic(self, x, a) -> bool | None: + if self == x: + return True + if not self.has_free(x): + return True + # subclasses should return True or False + return None + + def is_algebraic_expr(self, *syms): + """ + This tests whether a given expression is algebraic or not, in the + given symbols, syms. When syms is not given, all free symbols + will be used. The rational function does not have to be in expanded + or in any kind of canonical form. + + This function returns False for expressions that are "algebraic + expressions" with symbolic exponents. This is a simple extension to the + is_rational_function, including rational exponentiation. + + Examples + ======== + + >>> from sympy import Symbol, sqrt + >>> x = Symbol('x', real=True) + >>> sqrt(1 + x).is_rational_function() + False + >>> sqrt(1 + x).is_algebraic_expr() + True + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be an algebraic + expression to become one. + + >>> from sympy import exp, factor + >>> a = sqrt(exp(x)**2 + 2*exp(x) + 1)/(exp(x) + 1) + >>> a.is_algebraic_expr(x) + False + >>> factor(a).is_algebraic_expr() + True + + See Also + ======== + + is_rational_function + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Algebraic_expression + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return True + + return self._eval_is_algebraic_expr(syms) + + def _eval_is_algebraic_expr(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_free(*syms): + return True + # subclasses should return True or False + return None + + ################################################################################### + ##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ################## + ################################################################################### + + def series(self, x=None, x0=0, n=6, dir="+", logx=None, cdir=0): + """ + Series expansion of "self" around ``x = x0`` yielding either terms of + the series one by one (the lazy series given when n=None), else + all the terms at once when n != None. + + Returns the series expansion of "self" around the point ``x = x0`` + with respect to ``x`` up to ``O((x - x0)**n, x, x0)`` (default n is 6). + + If ``x=None`` and ``self`` is univariate, the univariate symbol will + be supplied, otherwise an error will be raised. + + Parameters + ========== + + expr : Expression + The expression whose series is to be expanded. + + x : Symbol + It is the variable of the expression to be calculated. + + x0 : Value + The value around which ``x`` is calculated. Can be any value + from ``-oo`` to ``oo``. + + n : Value + The value used to represent the order in terms of ``x**n``, + up to which the series is to be expanded. + + dir : String, optional + The series-expansion can be bi-directional. If ``dir="+"``, + then (x->x0+). If ``dir="-", then (x->x0-). For infinite + ``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined + from the direction of the infinity (i.e., ``dir="-"`` for + ``oo``). + + logx : optional + It is used to replace any log(x) in the returned series with a + symbolic value rather than evaluating the actual value. + + cdir : optional + It stands for complex direction, and indicates the direction + from which the expansion needs to be evaluated. + + Examples + ======== + + >>> from sympy import cos, exp, tan + >>> from sympy.abc import x, y + >>> cos(x).series() + 1 - x**2/2 + x**4/24 + O(x**6) + >>> cos(x).series(n=4) + 1 - x**2/2 + O(x**4) + >>> cos(x).series(x, x0=1, n=2) + cos(1) - (x - 1)*sin(1) + O((x - 1)**2, (x, 1)) + >>> e = cos(x + exp(y)) + >>> e.series(y, n=2) + cos(x + 1) - y*sin(x + 1) + O(y**2) + >>> e.series(x, n=2) + cos(exp(y)) - x*sin(exp(y)) + O(x**2) + + If ``n=None`` then a generator of the series terms will be returned. + + >>> term=cos(x).series(n=None) + >>> [next(term) for i in range(2)] + [1, -x**2/2] + + For ``dir=+`` (default) the series is calculated from the right and + for ``dir=-`` the series from the left. For smooth functions this + flag will not alter the results. + + >>> abs(x).series(dir="+") + x + >>> abs(x).series(dir="-") + -x + >>> f = tan(x) + >>> f.series(x, 2, 6, "+") + tan(2) + (1 + tan(2)**2)*(x - 2) + (x - 2)**2*(tan(2)**3 + tan(2)) + + (x - 2)**3*(1/3 + 4*tan(2)**2/3 + tan(2)**4) + (x - 2)**4*(tan(2)**5 + + 5*tan(2)**3/3 + 2*tan(2)/3) + (x - 2)**5*(2/15 + 17*tan(2)**2/15 + + 2*tan(2)**4 + tan(2)**6) + O((x - 2)**6, (x, 2)) + + >>> f.series(x, 2, 3, "-") + tan(2) + (2 - x)*(-tan(2)**2 - 1) + (2 - x)**2*(tan(2)**3 + tan(2)) + + O((x - 2)**3, (x, 2)) + + For rational expressions this method may return original expression without the Order term. + >>> (1/x).series(x, n=8) + 1/x + + Returns + ======= + + Expr : Expression + Series expansion of the expression about x0 + + Raises + ====== + + TypeError + If "n" and "x0" are infinity objects + + PoleError + If "x0" is an infinity object + + """ + if x is None: + syms = self.free_symbols + if not syms: + return self + elif len(syms) > 1: + raise ValueError('x must be given for multivariate functions.') + x = syms.pop() + + from .symbol import Dummy, Symbol + if isinstance(x, Symbol): + dep = x in self.free_symbols + else: + d = Dummy() + dep = d in self.xreplace({x: d}).free_symbols + if not dep: + if n is None: + return (s for s in [self]) + else: + return self + + if len(dir) != 1 or dir not in '+-': + raise ValueError("Dir must be '+' or '-'") + + if n is not None: + n = int(n) + if n < 0: + raise ValueError("Number of terms should be nonnegative") + + x0 = sympify(x0) + cdir = sympify(cdir) + from sympy.functions.elementary.complexes import im, sign + + if not cdir.is_zero: + if cdir.is_real: + dir = '+' if cdir.is_positive else '-' + else: + dir = '+' if im(cdir).is_positive else '-' + else: + if x0 and x0.is_infinite: + cdir = sign(x0).simplify() + elif str(dir) == "+": + cdir = S.One + elif str(dir) == "-": + cdir = S.NegativeOne + elif cdir == S.Zero: + cdir = S.One + + cdir = cdir/abs(cdir) + + if x0 and x0.is_infinite: + from .function import PoleError + try: + s = self.subs(x, cdir/x).series(x, n=n, dir='+', cdir=1) + if n is None: + return (si.subs(x, cdir/x) for si in s) + return s.subs(x, cdir/x) + except PoleError: + s = self.subs(x, cdir*x).aseries(x, n=n) + return s.subs(x, cdir*x) + + # use rep to shift origin to x0 and change sign (if dir is negative) + # and undo the process with rep2 + if x0 or cdir != 1: + s = self.subs({x: x0 + cdir*x}).series(x, x0=0, n=n, dir='+', logx=logx, cdir=1) + if n is None: # lseries... + return (si.subs({x: x/cdir - x0/cdir}) for si in s) + return s.subs({x: x/cdir - x0/cdir}) + + # from here on it's x0=0 and dir='+' handling + + if x.is_positive is x.is_negative is None or x.is_Symbol is not True: + # replace x with an x that has a positive assumption + xpos = Dummy('x', positive=True) + rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx, cdir=cdir) + if n is None: + return (s.subs(xpos, x) for s in rv) + else: + return rv.subs(xpos, x) + + from sympy.series.order import Order + if n is not None: # nseries handling + s1 = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + o = s1.getO() or S.Zero + if o: + # make sure the requested order is returned + ngot = o.getn() + if ngot > n: + # leave o in its current form (e.g. with x*log(x)) so + # it eats terms properly, then replace it below + if n != 0: + s1 += o.subs(x, x**Rational(n, ngot)) + else: + s1 += Order(1, x) + elif ngot < n: + # increase the requested number of terms to get the desired + # number keep increasing (up to 9) until the received order + # is different than the original order and then predict how + # many additional terms are needed + from sympy.functions.elementary.integers import ceiling + for more in range(1, 9): + s1 = self._eval_nseries(x, n=n + more, logx=logx, cdir=cdir) + newn = s1.getn() + if newn != ngot: + ndo = n + ceiling((n - ngot)*more/(newn - ngot)) + s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir) + while s1.getn() < n: + s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir) + ndo += 1 + break + else: + raise ValueError('Could not calculate %s terms for %s' + % (str(n), self)) + s1 += Order(x**n, x) + o = s1.getO() + s1 = s1.removeO() + elif s1.has(Order): + # asymptotic expansion + return s1 + else: + o = Order(x**n, x) + s1done = s1.doit() + try: + if (s1done + o).removeO() == s1done: + o = S.Zero + except NotImplementedError: + return s1 + + try: + from sympy.simplify.radsimp import collect + return collect(s1, x) + o + except NotImplementedError: + return s1 + o + + else: # lseries handling + def yield_lseries(s): + """Return terms of lseries one at a time.""" + for si in s: + if not si.is_Add: + yield si + continue + # yield terms 1 at a time if possible + # by increasing order until all the + # terms have been returned + yielded = 0 + o = Order(si, x)*x + ndid = 0 + ndo = len(si.args) + while 1: + do = (si - yielded + o).removeO() + o *= x + if not do or do.is_Order: + continue + if do.is_Add: + ndid += len(do.args) + else: + ndid += 1 + yield do + if ndid == ndo: + break + yielded += do + + return yield_lseries(self.removeO()._eval_lseries(x, logx=logx, cdir=cdir)) + + def aseries(self, x=None, n=6, bound=0, hir=False): + """Asymptotic Series expansion of self. + This is equivalent to ``self.series(x, oo, n)``. + + Parameters + ========== + + self : Expression + The expression whose series is to be expanded. + + x : Symbol + It is the variable of the expression to be calculated. + + n : Value + The value used to represent the order in terms of ``x**n``, + up to which the series is to be expanded. + + hir : Boolean + Set this parameter to be True to produce hierarchical series. + It stops the recursion at an early level and may provide nicer + and more useful results. + + bound : Value, Integer + Use the ``bound`` parameter to give limit on rewriting + coefficients in its normalised form. + + Examples + ======== + + >>> from sympy import sin, exp + >>> from sympy.abc import x + + >>> e = sin(1/x + exp(-x)) - sin(1/x) + + >>> e.aseries(x) + (1/(24*x**4) - 1/(2*x**2) + 1 + O(x**(-6), (x, oo)))*exp(-x) + + >>> e.aseries(x, n=3, hir=True) + -exp(-2*x)*sin(1/x)/2 + exp(-x)*cos(1/x) + O(exp(-3*x), (x, oo)) + + >>> e = exp(exp(x)/(1 - 1/x)) + + >>> e.aseries(x) + exp(exp(x)/(1 - 1/x)) + + >>> e.aseries(x, bound=3) # doctest: +SKIP + exp(exp(x)/x**2)*exp(exp(x)/x)*exp(-exp(x) + exp(x)/(1 - 1/x) - exp(x)/x - exp(x)/x**2)*exp(exp(x)) + + For rational expressions this method may return original expression without the Order term. + >>> (1/x).aseries(x, n=8) + 1/x + + Returns + ======= + + Expr + Asymptotic series expansion of the expression. + + Notes + ===== + + This algorithm is directly induced from the limit computational algorithm provided by Gruntz. + It majorly uses the mrv and rewrite sub-routines. The overall idea of this algorithm is first + to look for the most rapidly varying subexpression w of a given expression f and then expands f + in a series in w. Then same thing is recursively done on the leading coefficient + till we get constant coefficients. + + If the most rapidly varying subexpression of a given expression f is f itself, + the algorithm tries to find a normalised representation of the mrv set and rewrites f + using this normalised representation. + + If the expansion contains an order term, it will be either ``O(x ** (-n))`` or ``O(w ** (-n))`` + where ``w`` belongs to the most rapidly varying expression of ``self``. + + References + ========== + + .. [1] Gruntz, Dominik. A new algorithm for computing asymptotic series. + In: Proc. 1993 Int. Symp. Symbolic and Algebraic Computation. 1993. + pp. 239-244. + .. [2] Gruntz thesis - p90 + .. [3] https://en.wikipedia.org/wiki/Asymptotic_expansion + + See Also + ======== + + Expr.aseries: See the docstring of this function for complete details of this wrapper. + """ + + from .symbol import Dummy + + if x.is_positive is x.is_negative is None: + xpos = Dummy('x', positive=True) + return self.subs(x, xpos).aseries(xpos, n, bound, hir).subs(xpos, x) + + from .function import PoleError + from sympy.series.gruntz import mrv, rewrite + + try: + om, exps = mrv(self, x) + except PoleError: + return self + + # We move one level up by replacing `x` by `exp(x)`, and then + # computing the asymptotic series for f(exp(x)). Then asymptotic series + # can be obtained by moving one-step back, by replacing x by ln(x). + + from sympy.functions.elementary.exponential import exp, log + from sympy.series.order import Order + + if x in om: + s = self.subs(x, exp(x)).aseries(x, n, bound, hir).subs(x, log(x)) + if s.getO(): + return s + Order(1/x**n, (x, S.Infinity)) + return s + + k = Dummy('k', positive=True) + # f is rewritten in terms of omega + func, logw = rewrite(exps, om, x, k) + + if self in om: + if bound <= 0: + return self + s = (self.exp).aseries(x, n, bound=bound) + s = s.func(*[t.removeO() for t in s.args]) + try: + res = exp(s.subs(x, 1/x).as_leading_term(x).subs(x, 1/x)) + except PoleError: + res = self + + func = exp(self.args[0] - res.args[0]) / k + logw = log(1/res) + + s = func.series(k, 0, n) + from sympy.core.function import expand_mul + s = expand_mul(s) + # Hierarchical series + if hir: + return s.subs(k, exp(logw)) + + o = s.getO() + terms = sorted(Add.make_args(s.removeO()), key=lambda i: int(i.as_coeff_exponent(k)[1])) + s = S.Zero + has_ord = False + + # Then we recursively expand these coefficients one by one into + # their asymptotic series in terms of their most rapidly varying subexpressions. + for t in terms: + coeff, expo = t.as_coeff_exponent(k) + if coeff.has(x): + # Recursive step + snew = coeff.aseries(x, n, bound=bound-1) + if has_ord and snew.getO(): + break + elif snew.getO(): + has_ord = True + s += (snew * k**expo) + else: + s += t + + if not o or has_ord: + return s.subs(k, exp(logw)) + return (s + o).subs(k, exp(logw)) + + + def taylor_term(self, n, x, *previous_terms): + """General method for the taylor term. + + This method is slow, because it differentiates n-times. Subclasses can + redefine it to make it faster by using the "previous_terms". + """ + from .symbol import Dummy + from sympy.functions.combinatorial.factorials import factorial + + x = sympify(x) + _x = Dummy('x') + return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) * x**n / factorial(n) + + def lseries(self, x=None, x0=0, dir='+', logx=None, cdir=0): + """ + Wrapper for series yielding an iterator of the terms of the series. + + Note: an infinite series will yield an infinite iterator. The following, + for exaxmple, will never terminate. It will just keep printing terms + of the sin(x) series:: + + for term in sin(x).lseries(x): + print term + + The advantage of lseries() over nseries() is that many times you are + just interested in the next term in the series (i.e. the first term for + example), but you do not know how many you should ask for in nseries() + using the "n" parameter. + + See also nseries(). + """ + return self.series(x, x0, n=None, dir=dir, logx=logx, cdir=cdir) + + def _eval_lseries(self, x, logx=None, cdir=0): + # default implementation of lseries is using nseries(), and adaptively + # increasing the "n". As you can see, it is not very efficient, because + # we are calculating the series over and over again. Subclasses should + # override this method and implement much more efficient yielding of + # terms. + n = 0 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + while series.is_Order: + n += 1 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + e = series.removeO() + yield e + if e is S.Zero: + return + + while 1: + while 1: + n += 1 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir).removeO() + if e != series: + break + if (series - self).cancel() is S.Zero: + return + yield series - e + e = series + + def nseries(self, x=None, x0=0, n=6, dir='+', logx=None, cdir=0): + """ + Wrapper to _eval_nseries if assumptions allow, else to series. + + If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is + called. This calculates "n" terms in the innermost expressions and + then builds up the final series just by "cross-multiplying" everything + out. + + The optional ``logx`` parameter can be used to replace any log(x) in the + returned series with a symbolic value to avoid evaluating log(x) at 0. A + symbol to use in place of log(x) should be provided. + + Advantage -- it's fast, because we do not have to determine how many + terms we need to calculate in advance. + + Disadvantage -- you may end up with less terms than you may have + expected, but the O(x**n) term appended will always be correct and + so the result, though perhaps shorter, will also be correct. + + If any of those assumptions is not met, this is treated like a + wrapper to series which will try harder to return the correct + number of terms. + + See also lseries(). + + Examples + ======== + + >>> from sympy import sin, log, Symbol + >>> from sympy.abc import x, y + >>> sin(x).nseries(x, 0, 6) + x - x**3/6 + x**5/120 + O(x**6) + >>> log(x+1).nseries(x, 0, 5) + x - x**2/2 + x**3/3 - x**4/4 + O(x**5) + + Handling of the ``logx`` parameter --- in the following example the + expansion fails since ``sin`` does not have an asymptotic expansion + at -oo (the limit of log(x) as x approaches 0): + + >>> e = sin(log(x)) + >>> e.nseries(x, 0, 6) + Traceback (most recent call last): + ... + PoleError: ... + ... + >>> logx = Symbol('logx') + >>> e.nseries(x, 0, 6, logx=logx) + sin(logx) + + In the following example, the expansion works but only returns self + unless the ``logx`` parameter is used: + + >>> e = x**y + >>> e.nseries(x, 0, 2) + x**y + >>> e.nseries(x, 0, 2, logx=logx) + exp(logx*y) + + """ + if x and x not in self.free_symbols: + return self + if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None): + return self.series(x, x0, n, dir, cdir=cdir) + else: + return self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir): + """ + Return terms of series for self up to O(x**n) at x=0 + from the positive direction. + + This is a method that should be overridden in subclasses. Users should + never call this method directly (use .nseries() instead), so you do not + have to write docstrings for _eval_nseries(). + """ + raise NotImplementedError(filldedent(""" + The _eval_nseries method should be added to + %s to give terms up to O(x**n) at x=0 + from the positive direction so it is available when + nseries calls it.""" % self.func) + ) + + def limit(self, x, xlim, dir='+'): + """ Compute limit x->xlim. + """ + from sympy.series.limits import limit + return limit(self, x, xlim, dir) + + @cacheit + def as_leading_term(self, *symbols, logx=None, cdir=0): + """ + Returns the leading (nonzero) term of the series expansion of self. + + The _eval_as_leading_term routines are used to do this, and they must + always return a non-zero value. + + Examples + ======== + + >>> from sympy.abc import x + >>> (1 + x + x**2).as_leading_term(x) + 1 + >>> (1/x**2 + x + x**2).as_leading_term(x) + x**(-2) + + """ + if len(symbols) > 1: + c = self + for x in symbols: + c = c.as_leading_term(x, logx=logx, cdir=cdir) + return c + elif not symbols: + return self + x = sympify(symbols[0]) + cdir = sympify(cdir) + if not x.is_symbol: + raise ValueError('expecting a Symbol but got %s' % x) + if x not in self.free_symbols: + return self + obj = self._eval_as_leading_term(x, logx=logx, cdir=cdir) + if obj is not None: + from sympy.simplify.powsimp import powsimp + return powsimp(obj, deep=True, combine='exp') + raise NotImplementedError('as_leading_term(%s, %s)' % (self, x)) + + def _eval_as_leading_term(self, x, logx, cdir): + return self + + def as_coeff_exponent(self, x) -> tuple[Expr, Expr]: + """ ``c*x**e -> c,e`` where x can be any symbolic expression. + """ + from sympy.simplify.radsimp import collect + s = collect(self, x) + c, p = s.as_coeff_mul(x) + if len(p) == 1: + b, e = p[0].as_base_exp() + if b == x: + return c, e + return s, S.Zero + + def leadterm(self, x, logx=None, cdir=0): + """ + Returns the leading term a*x**b as a tuple (a, b). + + Examples + ======== + + >>> from sympy.abc import x + >>> (1+x+x**2).leadterm(x) + (1, 0) + >>> (1/x**2+x+x**2).leadterm(x) + (1, -2) + + """ + from .symbol import Dummy + from sympy.functions.elementary.exponential import log + l = self.as_leading_term(x, logx=logx, cdir=cdir) + d = Dummy('logx') + if l.has(log(x)): + l = l.subs(log(x), d) + c, e = l.as_coeff_exponent(x) + if x in c.free_symbols: + raise ValueError(filldedent(""" + cannot compute leadterm(%s, %s). The coefficient + should have been free of %s but got %s""" % (self, x, x, c))) + c = c.subs(d, log(x)) + return c, e + + def as_coeff_Mul(self, rational: bool = False) -> tuple['Number', Expr]: + """Efficiently extract the coefficient of a product.""" + return S.One, self + + def as_coeff_Add(self, rational=False) -> tuple['Number', Expr]: + """Efficiently extract the coefficient of a summation.""" + return S.Zero, self + + def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, + full=False): + """ + Compute formal power power series of self. + + See the docstring of the :func:`fps` function in sympy.series.formal for + more information. + """ + from sympy.series.formal import fps + + return fps(self, x, x0, dir, hyper, order, rational, full) + + def fourier_series(self, limits=None): + """Compute fourier sine/cosine series of self. + + See the docstring of the :func:`fourier_series` in sympy.series.fourier + for more information. + """ + from sympy.series.fourier import fourier_series + + return fourier_series(self, limits) + + ################################################################################### + ##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS #################### + ################################################################################### + + def diff(self, *symbols, **assumptions): + assumptions.setdefault("evaluate", True) + return _derivative_dispatch(self, *symbols, **assumptions) + + ########################################################################### + ###################### EXPRESSION EXPANSION METHODS ####################### + ########################################################################### + + # Relevant subclasses should override _eval_expand_hint() methods. See + # the docstring of expand() for more info. + + def _eval_expand_complex(self, **hints): + real, imag = self.as_real_imag(**hints) + return real + S.ImaginaryUnit*imag + + @staticmethod + def _expand_hint(expr, hint, deep=True, **hints): + """ + Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``. + + Returns ``(expr, hit)``, where expr is the (possibly) expanded + ``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and + ``False`` otherwise. + """ + hit = False + # XXX: Hack to support non-Basic args + # | + # V + if deep and getattr(expr, 'args', ()) and not expr.is_Atom: + sargs = [] + for arg in expr.args: + arg, arghit = Expr._expand_hint(arg, hint, **hints) + hit |= arghit + sargs.append(arg) + + if hit: + expr = expr.func(*sargs) + + if hasattr(expr, hint): + newexpr = getattr(expr, hint)(**hints) + if newexpr != expr: + return (newexpr, True) + + return (expr, hit) + + @cacheit + def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, + mul=True, log=True, multinomial=True, basic=True, **hints): + """ + Expand an expression using hints. + + See the docstring of the expand() function in sympy.core.function for + more information. + + """ + from sympy.simplify.radsimp import fraction + + hints.update(power_base=power_base, power_exp=power_exp, mul=mul, + log=log, multinomial=multinomial, basic=basic) + + expr = self + # default matches fraction's default + _fraction = lambda x: fraction(x, hints.get('exact', False)) + if hints.pop('frac', False): + n, d = [a.expand(deep=deep, modulus=modulus, **hints) + for a in _fraction(self)] + return n/d + elif hints.pop('denom', False): + n, d = _fraction(self) + return n/d.expand(deep=deep, modulus=modulus, **hints) + elif hints.pop('numer', False): + n, d = _fraction(self) + return n.expand(deep=deep, modulus=modulus, **hints)/d + + # Although the hints are sorted here, an earlier hint may get applied + # at a given node in the expression tree before another because of how + # the hints are applied. e.g. expand(log(x*(y + z))) -> log(x*y + + # x*z) because while applying log at the top level, log and mul are + # applied at the deeper level in the tree so that when the log at the + # upper level gets applied, the mul has already been applied at the + # lower level. + + # Additionally, because hints are only applied once, the expression + # may not be expanded all the way. For example, if mul is applied + # before multinomial, x*(x + 1)**2 won't be expanded all the way. For + # now, we just use a special case to make multinomial run before mul, + # so that at least polynomials will be expanded all the way. In the + # future, smarter heuristics should be applied. + # TODO: Smarter heuristics + + def _expand_hint_key(hint): + """Make multinomial come before mul""" + if hint == 'mul': + return 'mulz' + return hint + + for hint in sorted(hints.keys(), key=_expand_hint_key): + use_hint = hints[hint] + if use_hint: + hint = '_eval_expand_' + hint + expr, hit = Expr._expand_hint(expr, hint, deep=deep, **hints) + + while True: + was = expr + if hints.get('multinomial', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_multinomial', deep=deep, **hints) + if hints.get('mul', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_mul', deep=deep, **hints) + if hints.get('log', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_log', deep=deep, **hints) + if expr == was: + break + + if modulus is not None: + modulus = sympify(modulus) + + if not modulus.is_Integer or modulus <= 0: + raise ValueError( + "modulus must be a positive integer, got %s" % modulus) + + terms = [] + + for term in Add.make_args(expr): + coeff, tail = term.as_coeff_Mul(rational=True) + + coeff %= modulus + + if coeff: + terms.append(coeff*tail) + + expr = Add(*terms) + + return expr + + ########################################################################### + ################### GLOBAL ACTION VERB WRAPPER METHODS #################### + ########################################################################### + + def integrate(self, *args, **kwargs): + """See the integrate function in sympy.integrals""" + from sympy.integrals.integrals import integrate + return integrate(self, *args, **kwargs) + + def nsimplify(self, constants=(), tolerance=None, full=False): + """See the nsimplify function in sympy.simplify""" + from sympy.simplify.simplify import nsimplify + return nsimplify(self, constants, tolerance, full) + + def separate(self, deep=False, force=False): + """See the separate function in sympy.simplify""" + from .function import expand_power_base + return expand_power_base(self, deep=deep, force=force) + + def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True): + """See the collect function in sympy.simplify""" + from sympy.simplify.radsimp import collect + return collect(self, syms, func, evaluate, exact, distribute_order_term) + + def together(self, *args, **kwargs): + """See the together function in sympy.polys""" + from sympy.polys.rationaltools import together + return together(self, *args, **kwargs) + + def apart(self, x=None, **args): + """See the apart function in sympy.polys""" + from sympy.polys.partfrac import apart + return apart(self, x, **args) + + def ratsimp(self): + """See the ratsimp function in sympy.simplify""" + from sympy.simplify.ratsimp import ratsimp + return ratsimp(self) + + def trigsimp(self, **args): + """See the trigsimp function in sympy.simplify""" + from sympy.simplify.trigsimp import trigsimp + return trigsimp(self, **args) + + def radsimp(self, **kwargs): + """See the radsimp function in sympy.simplify""" + from sympy.simplify.radsimp import radsimp + return radsimp(self, **kwargs) + + def powsimp(self, *args, **kwargs): + """See the powsimp function in sympy.simplify""" + from sympy.simplify.powsimp import powsimp + return powsimp(self, *args, **kwargs) + + def combsimp(self): + """See the combsimp function in sympy.simplify""" + from sympy.simplify.combsimp import combsimp + return combsimp(self) + + def gammasimp(self): + """See the gammasimp function in sympy.simplify""" + from sympy.simplify.gammasimp import gammasimp + return gammasimp(self) + + def factor(self, *gens, **args): + """See the factor() function in sympy.polys.polytools""" + from sympy.polys.polytools import factor + return factor(self, *gens, **args) + + def cancel(self, *gens, **args): + """See the cancel function in sympy.polys""" + from sympy.polys.polytools import cancel + return cancel(self, *gens, **args) + + def invert(self, g, *gens, **args): + """Return the multiplicative inverse of ``self`` mod ``g`` + where ``self`` (and ``g``) may be symbolic expressions). + + See Also + ======== + sympy.core.intfunc.mod_inverse, sympy.polys.polytools.invert + """ + if self.is_number and getattr(g, 'is_number', True): + return mod_inverse(self, g) + from sympy.polys.polytools import invert + return invert(self, g, *gens, **args) + + def round(self, n=None): + """Return x rounded to the given decimal place. + + If a complex number would results, apply round to the real + and imaginary components of the number. + + Examples + ======== + + >>> from sympy import pi, E, I, S, Number + >>> pi.round() + 3 + >>> pi.round(2) + 3.14 + >>> (2*pi + E*I).round() + 6 + 3*I + + The round method has a chopping effect: + + >>> (2*pi + I/10).round() + 6 + >>> (pi/10 + 2*I).round() + 2*I + >>> (pi/10 + E*I).round(2) + 0.31 + 2.72*I + + Notes + ===== + + The Python ``round`` function uses the SymPy ``round`` method so it + will always return a SymPy number (not a Python float or int): + + >>> isinstance(round(S(123), -2), Number) + True + """ + x = self + + if not x.is_number: + raise TypeError("Cannot round symbolic expression") + if not x.is_Atom: + if not pure_complex(x.n(2), or_real=True): + raise TypeError( + 'Expected a number but got %s:' % func_name(x)) + elif x in _illegal: + return x + if not (xr := x.is_extended_real): + r, i = x.as_real_imag() + if xr is False: + return r.round(n) + S.ImaginaryUnit*i.round(n) + if i.equals(0): + return r.round(n) + if not x: + return S.Zero if n is None else x + + p = as_int(n or 0) + + if x.is_Integer: + return Integer(round(int(x), p)) + + digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1 + allow = digits_to_decimal + p + precs = [f._prec for f in x.atoms(Float)] + dps = prec_to_dps(max(precs)) if precs else None + if dps is None: + # assume everything is exact so use the Python + # float default or whatever was requested + dps = max(15, allow) + else: + allow = min(allow, dps) + # this will shift all digits to right of decimal + # and give us dps to work with as an int + shift = -digits_to_decimal + dps + extra = 1 # how far we look past known digits + # NOTE + # mpmath will calculate the binary representation to + # an arbitrary number of digits but we must base our + # answer on a finite number of those digits, e.g. + # .575 2589569785738035/2**52 in binary. + # mpmath shows us that the first 18 digits are + # >>> Float(.575).n(18) + # 0.574999999999999956 + # The default precision is 15 digits and if we ask + # for 15 we get + # >>> Float(.575).n(15) + # 0.575000000000000 + # mpmath handles rounding at the 15th digit. But we + # need to be careful since the user might be asking + # for rounding at the last digit and our semantics + # are to round toward the even final digit when there + # is a tie. So the extra digit will be used to make + # that decision. In this case, the value is the same + # to 15 digits: + # >>> Float(.575).n(16) + # 0.5750000000000000 + # Now converting this to the 15 known digits gives + # 575000000000000.0 + # which rounds to integer + # 5750000000000000 + # And now we can round to the desired digt, e.g. at + # the second from the left and we get + # 5800000000000000 + # and rescaling that gives + # 0.58 + # as the final result. + # If the value is made slightly less than 0.575 we might + # still obtain the same value: + # >>> Float(.575-1e-16).n(16)*10**15 + # 574999999999999.8 + # What 15 digits best represents the known digits (which are + # to the left of the decimal? 5750000000000000, the same as + # before. The only way we will round down (in this case) is + # if we declared that we had more than 15 digits of precision. + # For example, if we use 16 digits of precision, the integer + # we deal with is + # >>> Float(.575-1e-16).n(17)*10**16 + # 5749999999999998.4 + # and this now rounds to 5749999999999998 and (if we round to + # the 2nd digit from the left) we get 5700000000000000. + # + xf = x.n(dps + extra)*Pow(10, shift) + if xf.is_Number and xf._prec == 1: # xf.is_Add will raise below + # is x == 0? + if x.equals(0): + return Float(0) + raise ValueError('not computing with precision') + xi = Integer(xf) + # use the last digit to select the value of xi + # nearest to x before rounding at the desired digit + sign = 1 if x > 0 else -1 + dif2 = sign*(xf - xi).n(extra) + if dif2 < 0: + raise NotImplementedError( + 'not expecting int(x) to round away from 0') + if dif2 > .5: + xi += sign # round away from 0 + elif dif2 == .5: + xi += sign if xi%2 else -sign # round toward even + # shift p to the new position + ip = p - shift + # let Python handle the int rounding then rescale + xr = round(xi.p, ip) + # restore scale + rv = Rational(xr, Pow(10, shift)) + # return Float or Integer + if rv.is_Integer: + if n is None: # the single-arg case + return rv + # use str or else it won't be a float + return Float(str(rv), dps) # keep same precision + else: + if not allow and rv > self: + allow += 1 + return Float(rv, allow) + + __round__ = round + + def _eval_derivative_matrix_lines(self, x): + from sympy.matrices.expressions.matexpr import _LeftRightArgs + return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))] + + +class AtomicExpr(Atom, Expr): + """ + A parent class for object which are both atoms and Exprs. + + For example: Symbol, Number, Rational, Integer, ... + But not: Add, Mul, Pow, ... + """ + is_number = False + is_Atom = True + + __slots__ = () + + def _eval_derivative(self, s): + if self == s: + return S.One + return S.Zero + + def _eval_derivative_n_times(self, s, n): + from .containers import Tuple + from sympy.matrices.expressions.matexpr import MatrixExpr + from sympy.matrices.matrixbase import MatrixBase + if isinstance(s, (MatrixBase, Tuple, Iterable, MatrixExpr)): + return super()._eval_derivative_n_times(s, n) + from .relational import Eq + from sympy.functions.elementary.piecewise import Piecewise + if self == s: + return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) + else: + return Piecewise((self, Eq(n, 0)), (0, True)) + + def _eval_is_polynomial(self, syms): + return True + + def _eval_is_rational_function(self, syms): + return self not in _illegal + + def _eval_is_meromorphic(self, x, a): + from sympy.calculus.accumulationbounds import AccumBounds + return (not self.is_Number or self.is_finite) and not isinstance(self, AccumBounds) + + def _eval_is_algebraic_expr(self, syms): + return True + + def _eval_nseries(self, x, n, logx, cdir=0): + return self + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return {self} + + +def _mag(x): + r"""Return integer $i$ such that $0.1 \le x/10^i < 1$ + + Examples + ======== + + >>> from sympy.core.expr import _mag + >>> from sympy import Float + >>> _mag(Float(.1)) + 0 + >>> _mag(Float(.01)) + -1 + >>> _mag(Float(1234)) + 4 + """ + from math import log10, ceil, log + xpos = abs(x.n()) + if not xpos: + return S.Zero + try: + mag_first_dig = int(ceil(log10(xpos))) + except (ValueError, OverflowError): + mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10))) + # check that we aren't off by 1 + if (xpos/S(10)**mag_first_dig) >= 1: + assert 1 <= (xpos/S(10)**mag_first_dig) < 10 + mag_first_dig += 1 + return mag_first_dig + + +class UnevaluatedExpr(Expr): + """ + Expression that is not evaluated unless released. + + Examples + ======== + + >>> from sympy import UnevaluatedExpr + >>> from sympy.abc import x + >>> x*(1/x) + 1 + >>> x*UnevaluatedExpr(1/x) + x*1/x + + """ + + def __new__(cls, arg, **kwargs): + arg = _sympify(arg) + obj = Expr.__new__(cls, arg, **kwargs) + return obj + + def doit(self, **hints): + if hints.get("deep", True): + return self.args[0].doit(**hints) + else: + return self.args[0] + + + +def unchanged(func, *args): + """Return True if `func` applied to the `args` is unchanged. + Can be used instead of `assert foo == foo`. + + Examples + ======== + + >>> from sympy import Piecewise, cos, pi + >>> from sympy.core.expr import unchanged + >>> from sympy.abc import x + + >>> unchanged(cos, 1) # instead of assert cos(1) == cos(1) + True + + >>> unchanged(cos, pi) + False + + Comparison of args uses the builtin capabilities of the object's + arguments to test for equality so args can be defined loosely. Here, + the ExprCondPair arguments of Piecewise compare as equal to the + tuples that can be used to create the Piecewise: + + >>> unchanged(Piecewise, (x, x > 1), (0, True)) + True + """ + f = func(*args) + return f.func == func and f.args == args + + +class ExprBuilder: + def __init__(self, op, args=None, validator=None, check=True): + if not hasattr(op, "__call__"): + raise TypeError("op {} needs to be callable".format(op)) + self.op = op + if args is None: + self.args = [] + else: + self.args = args + self.validator = validator + if (validator is not None) and check: + self.validate() + + @staticmethod + def _build_args(args): + return [i.build() if isinstance(i, ExprBuilder) else i for i in args] + + def validate(self): + if self.validator is None: + return + args = self._build_args(self.args) + self.validator(*args) + + def build(self, check=True): + args = self._build_args(self.args) + if self.validator and check: + self.validator(*args) + return self.op(*args) + + def append_argument(self, arg, check=True): + self.args.append(arg) + if self.validator and check: + self.validate(*self.args) + + def __getitem__(self, item): + if item == 0: + return self.op + else: + return self.args[item-1] + + def __repr__(self): + return str(self.build()) + + def search_element(self, elem): + for i, arg in enumerate(self.args): + if isinstance(arg, ExprBuilder): + ret = arg.search_index(elem) + if ret is not None: + return (i,) + ret + elif id(arg) == id(elem): + return (i,) + return None + + +from .mul import Mul +from .add import Add +from .power import Pow +from .function import Function, _derivative_dispatch +from .mod import Mod +from .exprtools import factor_terms +from .numbers import Float, Integer, Rational, _illegal, int_valued diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/exprtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/exprtools.py new file mode 100644 index 0000000000000000000000000000000000000000..4868e4416a72e91dc12c9113d90b9c31c5e26011 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/exprtools.py @@ -0,0 +1,1573 @@ +"""Tools for manipulating of large commutative expressions. """ + +from __future__ import annotations + +from .add import Add +from .mul import Mul, _keep_coeff +from .power import Pow +from .basic import Basic +from .expr import Expr +from .function import expand_power_exp +from .sympify import sympify +from .numbers import Rational, Integer, Number, I, equal_valued +from .singleton import S +from .sorting import default_sort_key, ordered +from .symbol import Dummy +from .traversal import preorder_traversal +from .coreerrors import NonCommutativeExpression +from .containers import Tuple, Dict +from sympy.external.gmpy import SYMPY_INTS +from sympy.utilities.iterables import (common_prefix, common_suffix, + variations, iterable, is_sequence) + +from collections import defaultdict + + +_eps = Dummy(positive=True) + + +def _isnumber(i): + return isinstance(i, (SYMPY_INTS, float)) or i.is_Number + + +def _monotonic_sign(self): + """Return the value closest to 0 that ``self`` may have if all symbols + are signed and the result is uniformly the same sign for all values of symbols. + If a symbol is only signed but not known to be an + integer or the result is 0 then a symbol representative of the sign of self + will be returned. Otherwise, None is returned if a) the sign could be positive + or negative or b) self is not in one of the following forms: + + - L(x, y, ...) + A: a function linear in all symbols x, y, ... with an + additive constant; if A is zero then the function can be a monomial whose + sign is monotonic over the range of the variables, e.g. (x + 1)**3 if x is + nonnegative. + - A/L(x, y, ...) + B: the inverse of a function linear in all symbols x, y, ... + that does not have a sign change from positive to negative for any set + of values for the variables. + - M(x, y, ...) + A: a monomial M whose factors are all signed and a constant, A. + - A/M(x, y, ...) + B: the inverse of a monomial and constants A and B. + - P(x): a univariate polynomial + + Examples + ======== + + >>> from sympy.core.exprtools import _monotonic_sign as F + >>> from sympy import Dummy + >>> nn = Dummy(integer=True, nonnegative=True) + >>> p = Dummy(integer=True, positive=True) + >>> p2 = Dummy(integer=True, positive=True) + >>> F(nn + 1) + 1 + >>> F(p - 1) + _nneg + >>> F(nn*p + 1) + 1 + >>> F(p2*p + 1) + 2 + >>> F(nn - 1) # could be negative, zero or positive + """ + if not self.is_extended_real: + return + + if (-self).is_Symbol: + rv = _monotonic_sign(-self) + return rv if rv is None else -rv + + if not self.is_Add and self.as_numer_denom()[1].is_number: + s = self + if s.is_prime: + if s.is_odd: + return Integer(3) + else: + return Integer(2) + elif s.is_composite: + if s.is_odd: + return Integer(9) + else: + return Integer(4) + elif s.is_positive: + if s.is_even: + if s.is_prime is False: + return Integer(4) + else: + return Integer(2) + elif s.is_integer: + return S.One + else: + return _eps + elif s.is_extended_negative: + if s.is_even: + return Integer(-2) + elif s.is_integer: + return S.NegativeOne + else: + return -_eps + if s.is_zero or s.is_extended_nonpositive or s.is_extended_nonnegative: + return S.Zero + return None + + # univariate polynomial + free = self.free_symbols + if len(free) == 1: + if self.is_polynomial(): + from sympy.polys.polytools import real_roots + from sympy.polys.polyroots import roots + from sympy.polys.polyerrors import PolynomialError + x = free.pop() + x0 = _monotonic_sign(x) + if x0 in (_eps, -_eps): + x0 = S.Zero + if x0 is not None: + d = self.diff(x) + if d.is_number: + currentroots = [] + else: + try: + currentroots = real_roots(d) + except (PolynomialError, NotImplementedError): + currentroots = [r for r in roots(d, x) if r.is_extended_real] + y = self.subs(x, x0) + if x.is_nonnegative and all( + (r - x0).is_nonpositive for r in currentroots): + if y.is_nonnegative and d.is_positive: + if y: + return y if y.is_positive else Dummy('pos', positive=True) + else: + return Dummy('nneg', nonnegative=True) + if y.is_nonpositive and d.is_negative: + if y: + return y if y.is_negative else Dummy('neg', negative=True) + else: + return Dummy('npos', nonpositive=True) + elif x.is_nonpositive and all( + (r - x0).is_nonnegative for r in currentroots): + if y.is_nonnegative and d.is_negative: + if y: + return Dummy('pos', positive=True) + else: + return Dummy('nneg', nonnegative=True) + if y.is_nonpositive and d.is_positive: + if y: + return Dummy('neg', negative=True) + else: + return Dummy('npos', nonpositive=True) + else: + n, d = self.as_numer_denom() + den = None + if n.is_number: + den = _monotonic_sign(d) + elif not d.is_number: + if _monotonic_sign(n) is not None: + den = _monotonic_sign(d) + if den is not None and (den.is_positive or den.is_negative): + v = n*den + if v.is_positive: + return Dummy('pos', positive=True) + elif v.is_nonnegative: + return Dummy('nneg', nonnegative=True) + elif v.is_negative: + return Dummy('neg', negative=True) + elif v.is_nonpositive: + return Dummy('npos', nonpositive=True) + return None + + # multivariate + c, a = self.as_coeff_Add() + v = None + if not a.is_polynomial(): + # F/A or A/F where A is a number and F is a signed, rational monomial + n, d = a.as_numer_denom() + if not (n.is_number or d.is_number): + return + if ( + a.is_Mul or a.is_Pow) and \ + a.is_rational and \ + all(p.exp.is_Integer for p in a.atoms(Pow) if p.is_Pow) and \ + (a.is_positive or a.is_negative): + v = S.One + for ai in Mul.make_args(a): + if ai.is_number: + v *= ai + continue + reps = {} + for x in ai.free_symbols: + reps[x] = _monotonic_sign(x) + if reps[x] is None: + return + v *= ai.subs(reps) + elif c: + # signed linear expression + if not any(p for p in a.atoms(Pow) if not p.is_number) and (a.is_nonpositive or a.is_nonnegative): + free = list(a.free_symbols) + p = {} + for i in free: + v = _monotonic_sign(i) + if v is None: + return + p[i] = v or (_eps if i.is_nonnegative else -_eps) + v = a.xreplace(p) + if v is not None: + rv = v + c + if v.is_nonnegative and rv.is_positive: + return rv.subs(_eps, 0) + if v.is_nonpositive and rv.is_negative: + return rv.subs(_eps, 0) + + +def decompose_power(expr: Expr) -> tuple[Expr, int]: + """ + Decompose power into symbolic base and integer exponent. + + Examples + ======== + + >>> from sympy.core.exprtools import decompose_power + >>> from sympy.abc import x, y + >>> from sympy import exp + + >>> decompose_power(x) + (x, 1) + >>> decompose_power(x**2) + (x, 2) + >>> decompose_power(exp(2*y/3)) + (exp(y/3), 2) + + """ + base, exp = expr.as_base_exp() + + if exp.is_Number: + if exp.is_Rational: + if not exp.is_Integer: + base = Pow(base, Rational(1, exp.q)) # type: ignore + e = exp.p # type: ignore + else: + base, e = expr, 1 + else: + exp, tail = exp.as_coeff_Mul(rational=True) + + if exp is S.NegativeOne: + base, e = Pow(base, tail), -1 + elif exp is not S.One: + # todo: after dropping python 3.7 support, use overload and Literal + # in as_coeff_Mul to make exp Rational, and remove these 2 ignores + tail = _keep_coeff(Rational(1, exp.q), tail) # type: ignore + base, e = Pow(base, tail), exp.p # type: ignore + else: + base, e = expr, 1 + + return base, e + + +def decompose_power_rat(expr: Expr) -> tuple[Expr, Rational]: + """ + Decompose power into symbolic base and rational exponent; + if the exponent is not a Rational, then separate only the + integer coefficient. + + Examples + ======== + + >>> from sympy.core.exprtools import decompose_power_rat + >>> from sympy.abc import x + >>> from sympy import sqrt, exp + + >>> decompose_power_rat(sqrt(x)) + (x, 1/2) + >>> decompose_power_rat(exp(-3*x/2)) + (exp(x/2), -3) + + """ + base, exp = expr.as_base_exp() + if not exp.is_Rational: + base, exp_i = decompose_power(expr) + exp = Integer(exp_i) + return base, exp # type: ignore + + +class Factors: + """Efficient representation of ``f_1*f_2*...*f_n``.""" + + __slots__ = ('factors', 'gens') + + def __init__(self, factors=None): # Factors + """Initialize Factors from dict or expr. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x + >>> from sympy import I + >>> e = 2*x**3 + >>> Factors(e) + Factors({2: 1, x: 3}) + >>> Factors(e.as_powers_dict()) + Factors({2: 1, x: 3}) + >>> f = _ + >>> f.factors # underlying dictionary + {2: 1, x: 3} + >>> f.gens # base of each factor + frozenset({2, x}) + >>> Factors(0) + Factors({0: 1}) + >>> Factors(I) + Factors({I: 1}) + + Notes + ===== + + Although a dictionary can be passed, only minimal checking is + performed: powers of -1 and I are made canonical. + + """ + if isinstance(factors, (SYMPY_INTS, float)): + factors = S(factors) + if isinstance(factors, Factors): + factors = factors.factors.copy() + elif factors in (None, S.One): + factors = {} + elif factors is S.Zero or factors == 0: + factors = {S.Zero: S.One} + elif isinstance(factors, Number): + n = factors + factors = {} + if n < 0: + factors[S.NegativeOne] = S.One + n = -n + if n is not S.One: + if n.is_Float or n.is_Integer or n is S.Infinity: + factors[n] = S.One + elif n.is_Rational: + # since we're processing Numbers, the denominator is + # stored with a negative exponent; all other factors + # are left . + if n.p != 1: + factors[Integer(n.p)] = S.One + factors[Integer(n.q)] = S.NegativeOne + else: + raise ValueError('Expected Float|Rational|Integer, not %s' % n) + elif isinstance(factors, Basic) and not factors.args: + factors = {factors: S.One} + elif isinstance(factors, Expr): + c, nc = factors.args_cnc() + i = c.count(I) + for _ in range(i): + c.remove(I) + factors = dict(Mul._from_args(c).as_powers_dict()) + # Handle all rational Coefficients + for f in list(factors.keys()): + if isinstance(f, Rational) and not isinstance(f, Integer): + p, q = Integer(f.p), Integer(f.q) + factors[p] = (factors[p] if p in factors else S.Zero) + factors[f] + factors[q] = (factors[q] if q in factors else S.Zero) - factors[f] + factors.pop(f) + if i: + factors[I] = factors.get(I, S.Zero) + i + if nc: + factors[Mul(*nc, evaluate=False)] = S.One + else: + factors = factors.copy() # /!\ should be dict-like + + # tidy up -/+1 and I exponents if Rational + + handle = [k for k in factors if k is I or k in (-1, 1)] + if handle: + i1 = S.One + for k in handle: + if not _isnumber(factors[k]): + continue + i1 *= k**factors.pop(k) + if i1 is not S.One: + for a in i1.args if i1.is_Mul else [i1]: # at worst, -1.0*I*(-1)**e + if a is S.NegativeOne: + factors[a] = S.One + elif a is I: + factors[I] = S.One + elif a.is_Pow: + factors[a.base] = factors.get(a.base, S.Zero) + a.exp + elif equal_valued(a, 1): + factors[a] = S.One + elif equal_valued(a, -1): + factors[-a] = S.One + factors[S.NegativeOne] = S.One + else: + raise ValueError('unexpected factor in i1: %s' % a) + + self.factors = factors + keys = getattr(factors, 'keys', None) + if keys is None: + raise TypeError('expecting Expr or dictionary') + self.gens = frozenset(keys()) + + def __hash__(self): # Factors + keys = tuple(ordered(self.factors.keys())) + values = [self.factors[k] for k in keys] + return hash((keys, values)) + + def __repr__(self): # Factors + return "Factors({%s})" % ', '.join( + ['%s: %s' % (k, v) for k, v in ordered(self.factors.items())]) + + @property + def is_zero(self): # Factors + """ + >>> from sympy.core.exprtools import Factors + >>> Factors(0).is_zero + True + """ + f = self.factors + return len(f) == 1 and S.Zero in f + + @property + def is_one(self): # Factors + """ + >>> from sympy.core.exprtools import Factors + >>> Factors(1).is_one + True + """ + return not self.factors + + def as_expr(self): # Factors + """Return the underlying expression. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y + >>> Factors((x*y**2).as_powers_dict()).as_expr() + x*y**2 + + """ + + args = [] + for factor, exp in self.factors.items(): + if exp != 1: + if isinstance(exp, Integer): + b, e = factor.as_base_exp() + e = _keep_coeff(exp, e) + args.append(b**e) + else: + args.append(factor**exp) + else: + args.append(factor) + return Mul(*args) + + def mul(self, other): # Factors + """Return Factors of ``self * other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.mul(b) + Factors({x: 2, y: 3, z: -1}) + >>> a*b + Factors({x: 2, y: 3, z: -1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if any(f.is_zero for f in (self, other)): + return Factors(S.Zero) + factors = dict(self.factors) + + for factor, exp in other.factors.items(): + if factor in factors: + exp = factors[factor] + exp + + if not exp: + del factors[factor] + continue + + factors[factor] = exp + + return Factors(factors) + + def normal(self, other): + """Return ``self`` and ``other`` with ``gcd`` removed from each. + The only differences between this and method ``div`` is that this + is 1) optimized for the case when there are few factors in common and + 2) this does not raise an error if ``other`` is zero. + + See Also + ======== + div + + """ + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + return (Factors(), Factors(S.Zero)) + if self.is_zero: + return (Factors(S.Zero), Factors()) + + self_factors = dict(self.factors) + other_factors = dict(other.factors) + + for factor, self_exp in self.factors.items(): + try: + other_exp = other.factors[factor] + except KeyError: + continue + + exp = self_exp - other_exp + + if not exp: + del self_factors[factor] + del other_factors[factor] + elif _isnumber(exp): + if exp > 0: + self_factors[factor] = exp + del other_factors[factor] + else: + del self_factors[factor] + other_factors[factor] = -exp + else: + r = self_exp.extract_additively(other_exp) + if r is not None: + if r: + self_factors[factor] = r + del other_factors[factor] + else: # should be handled already + del self_factors[factor] + del other_factors[factor] + else: + sc, sa = self_exp.as_coeff_Add() + if sc: + oc, oa = other_exp.as_coeff_Add() + diff = sc - oc + if diff > 0: + self_factors[factor] -= oc + other_exp = oa + elif diff < 0: + self_factors[factor] -= sc + other_factors[factor] -= sc + other_exp = oa - diff + else: + self_factors[factor] = sa + other_exp = oa + if other_exp: + other_factors[factor] = other_exp + else: + del other_factors[factor] + + return Factors(self_factors), Factors(other_factors) + + def div(self, other): # Factors + """Return ``self`` and ``other`` with ``gcd`` removed from each. + This is optimized for the case when there are many factors in common. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> from sympy import S + + >>> a = Factors((x*y**2).as_powers_dict()) + >>> a.div(a) + (Factors({}), Factors({})) + >>> a.div(x*z) + (Factors({y: 2}), Factors({z: 1})) + + The ``/`` operator only gives ``quo``: + + >>> a/x + Factors({y: 2}) + + Factors treats its factors as though they are all in the numerator, so + if you violate this assumption the results will be correct but will + not strictly correspond to the numerator and denominator of the ratio: + + >>> a.div(x/z) + (Factors({y: 2}), Factors({z: -1})) + + Factors is also naive about bases: it does not attempt any denesting + of Rational-base terms, for example the following does not become + 2**(2*x)/2. + + >>> Factors(2**(2*x + 2)).div(S(8)) + (Factors({2: 2*x + 2}), Factors({8: 1})) + + factor_terms can clean up such Rational-bases powers: + + >>> from sympy import factor_terms + >>> n, d = Factors(2**(2*x + 2)).div(S(8)) + >>> n.as_expr()/d.as_expr() + 2**(2*x + 2)/8 + >>> factor_terms(_) + 2**(2*x)/2 + + """ + quo, rem = dict(self.factors), {} + + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + raise ZeroDivisionError + if self.is_zero: + return (Factors(S.Zero), Factors()) + + for factor, exp in other.factors.items(): + if factor in quo: + d = quo[factor] - exp + if _isnumber(d): + if d <= 0: + del quo[factor] + + if d >= 0: + if d: + quo[factor] = d + + continue + + exp = -d + + else: + r = quo[factor].extract_additively(exp) + if r is not None: + if r: + quo[factor] = r + else: # should be handled already + del quo[factor] + else: + other_exp = exp + sc, sa = quo[factor].as_coeff_Add() + if sc: + oc, oa = other_exp.as_coeff_Add() + diff = sc - oc + if diff > 0: + quo[factor] -= oc + other_exp = oa + elif diff < 0: + quo[factor] -= sc + other_exp = oa - diff + else: + quo[factor] = sa + other_exp = oa + if other_exp: + rem[factor] = other_exp + else: + assert factor not in rem + continue + + rem[factor] = exp + + return Factors(quo), Factors(rem) + + def quo(self, other): # Factors + """Return numerator Factor of ``self / other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.quo(b) # same as a/b + Factors({y: 1}) + """ + return self.div(other)[0] + + def rem(self, other): # Factors + """Return denominator Factors of ``self / other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.rem(b) + Factors({z: -1}) + >>> a.rem(a) + Factors({}) + """ + return self.div(other)[1] + + def pow(self, other): # Factors + """Return self raised to a non-negative integer power. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y + >>> a = Factors((x*y**2).as_powers_dict()) + >>> a**2 + Factors({x: 2, y: 4}) + + """ + if isinstance(other, Factors): + other = other.as_expr() + if other.is_Integer: + other = int(other) + if isinstance(other, SYMPY_INTS) and other >= 0: + factors = {} + + if other: + for factor, exp in self.factors.items(): + factors[factor] = exp*other + + return Factors(factors) + else: + raise ValueError("expected non-negative integer, got %s" % other) + + def gcd(self, other): # Factors + """Return Factors of ``gcd(self, other)``. The keys are + the intersection of factors with the minimum exponent for + each factor. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.gcd(b) + Factors({x: 1, y: 1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + return Factors(self.factors) + + factors = {} + + for factor, exp in self.factors.items(): + factor, exp = sympify(factor), sympify(exp) + if factor in other.factors: + lt = (exp - other.factors[factor]).is_negative + if lt == True: + factors[factor] = exp + elif lt == False: + factors[factor] = other.factors[factor] + + return Factors(factors) + + def lcm(self, other): # Factors + """Return Factors of ``lcm(self, other)`` which are + the union of factors with the maximum exponent for + each factor. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.lcm(b) + Factors({x: 1, y: 2, z: -1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if any(f.is_zero for f in (self, other)): + return Factors(S.Zero) + + factors = dict(self.factors) + + for factor, exp in other.factors.items(): + if factor in factors: + exp = max(exp, factors[factor]) + + factors[factor] = exp + + return Factors(factors) + + def __mul__(self, other): # Factors + return self.mul(other) + + def __divmod__(self, other): # Factors + return self.div(other) + + def __truediv__(self, other): # Factors + return self.quo(other) + + def __mod__(self, other): # Factors + return self.rem(other) + + def __pow__(self, other): # Factors + return self.pow(other) + + def __eq__(self, other): # Factors + if not isinstance(other, Factors): + other = Factors(other) + return self.factors == other.factors + + def __ne__(self, other): # Factors + return not self == other + + +class Term: + """Efficient representation of ``coeff*(numer/denom)``. """ + + __slots__ = ('coeff', 'numer', 'denom') + + def __init__(self, term, numer=None, denom=None): # Term + if numer is None and denom is None: + if not term.is_commutative: + raise NonCommutativeExpression( + 'commutative expression expected') + + coeff, factors = term.as_coeff_mul() + numer, denom = defaultdict(int), defaultdict(int) + + for factor in factors: + base, exp = decompose_power(factor) + + if base.is_Add: + cont, base = base.primitive() + coeff *= cont**exp + + if exp > 0: + numer[base] += exp + else: + denom[base] += -exp + + numer = Factors(numer) + denom = Factors(denom) + else: + coeff = term + + if numer is None: + numer = Factors() + + if denom is None: + denom = Factors() + + self.coeff = coeff + self.numer = numer + self.denom = denom + + def __hash__(self): # Term + return hash((self.coeff, self.numer, self.denom)) + + def __repr__(self): # Term + return "Term(%s, %s, %s)" % (self.coeff, self.numer, self.denom) + + def as_expr(self): # Term + return self.coeff*(self.numer.as_expr()/self.denom.as_expr()) + + def mul(self, other): # Term + coeff = self.coeff*other.coeff + numer = self.numer.mul(other.numer) + denom = self.denom.mul(other.denom) + + numer, denom = numer.normal(denom) + + return Term(coeff, numer, denom) + + def inv(self): # Term + return Term(1/self.coeff, self.denom, self.numer) + + def quo(self, other): # Term + return self.mul(other.inv()) + + def pow(self, other): # Term + if other < 0: + return self.inv().pow(-other) + else: + return Term(self.coeff ** other, + self.numer.pow(other), + self.denom.pow(other)) + + def gcd(self, other): # Term + return Term(self.coeff.gcd(other.coeff), + self.numer.gcd(other.numer), + self.denom.gcd(other.denom)) + + def lcm(self, other): # Term + return Term(self.coeff.lcm(other.coeff), + self.numer.lcm(other.numer), + self.denom.lcm(other.denom)) + + def __mul__(self, other): # Term + if isinstance(other, Term): + return self.mul(other) + else: + return NotImplemented + + def __truediv__(self, other): # Term + if isinstance(other, Term): + return self.quo(other) + else: + return NotImplemented + + def __pow__(self, other): # Term + if isinstance(other, SYMPY_INTS): + return self.pow(other) + else: + return NotImplemented + + def __eq__(self, other): # Term + return (self.coeff == other.coeff and + self.numer == other.numer and + self.denom == other.denom) + + def __ne__(self, other): # Term + return not self == other + + +def _gcd_terms(terms, isprimitive=False, fraction=True): + """Helper function for :func:`gcd_terms`. + + Parameters + ========== + + isprimitive : boolean, optional + If ``isprimitive`` is True then the call to primitive + for an Add will be skipped. This is useful when the + content has already been extracted. + + fraction : boolean, optional + If ``fraction`` is True then the expression will appear over a common + denominator, the lcm of all term denominators. + """ + + if isinstance(terms, Basic) and not isinstance(terms, Tuple): + terms = Add.make_args(terms) + + terms = list(map(Term, [t for t in terms if t])) + + # there is some simplification that may happen if we leave this + # here rather than duplicate it before the mapping of Term onto + # the terms + if len(terms) == 0: + return S.Zero, S.Zero, S.One + + if len(terms) == 1: + cont = terms[0].coeff + numer = terms[0].numer.as_expr() + denom = terms[0].denom.as_expr() + + else: + cont = terms[0] + for term in terms[1:]: + cont = cont.gcd(term) + + for i, term in enumerate(terms): + terms[i] = term.quo(cont) + + if fraction: + denom = terms[0].denom + + for term in terms[1:]: + denom = denom.lcm(term.denom) + + numers = [] + for term in terms: + numer = term.numer.mul(denom.quo(term.denom)) + numers.append(term.coeff*numer.as_expr()) + else: + numers = [t.as_expr() for t in terms] + denom = Term(S.One).numer + + cont = cont.as_expr() + numer = Add(*numers) + denom = denom.as_expr() + + if not isprimitive and numer.is_Add: + _cont, numer = numer.primitive() + cont *= _cont + + return cont, numer, denom + + +def gcd_terms(terms, isprimitive=False, clear=True, fraction=True): + """Compute the GCD of ``terms`` and put them together. + + Parameters + ========== + + terms : Expr + Can be an expression or a non-Basic sequence of expressions + which will be handled as though they are terms from a sum. + + isprimitive : bool, optional + If ``isprimitive`` is True the _gcd_terms will not run the primitive + method on the terms. + + clear : bool, optional + It controls the removal of integers from the denominator of an Add + expression. When True (default), all numerical denominator will be cleared; + when False the denominators will be cleared only if all terms had numerical + denominators other than 1. + + fraction : bool, optional + When True (default), will put the expression over a common + denominator. + + Examples + ======== + + >>> from sympy import gcd_terms + >>> from sympy.abc import x, y + + >>> gcd_terms((x + 1)**2*y + (x + 1)*y**2) + y*(x + 1)*(x + y + 1) + >>> gcd_terms(x/2 + 1) + (x + 2)/2 + >>> gcd_terms(x/2 + 1, clear=False) + x/2 + 1 + >>> gcd_terms(x/2 + y/2, clear=False) + (x + y)/2 + >>> gcd_terms(x/2 + 1/x) + (x**2 + 2)/(2*x) + >>> gcd_terms(x/2 + 1/x, fraction=False) + (x + 2/x)/2 + >>> gcd_terms(x/2 + 1/x, fraction=False, clear=False) + x/2 + 1/x + + >>> gcd_terms(x/2/y + 1/x/y) + (x**2 + 2)/(2*x*y) + >>> gcd_terms(x/2/y + 1/x/y, clear=False) + (x**2/2 + 1)/(x*y) + >>> gcd_terms(x/2/y + 1/x/y, clear=False, fraction=False) + (x/2 + 1/x)/y + + The ``clear`` flag was ignored in this case because the returned + expression was a rational expression, not a simple sum. + + See Also + ======== + + factor_terms, sympy.polys.polytools.terms_gcd + + """ + def mask(terms): + """replace nc portions of each term with a unique Dummy symbols + and return the replacements to restore them""" + args = [(a, []) if a.is_commutative else a.args_cnc() for a in terms] + reps = [] + for i, (c, nc) in enumerate(args): + if nc: + nc = Mul(*nc) + d = Dummy() + reps.append((d, nc)) + c.append(d) + args[i] = Mul(*c) + else: + args[i] = c + return args, dict(reps) + + isadd = isinstance(terms, Add) + addlike = isadd or not isinstance(terms, Basic) and \ + is_sequence(terms, include=set) and \ + not isinstance(terms, Dict) + + if addlike: + if isadd: # i.e. an Add + terms = list(terms.args) + else: + terms = sympify(terms) + terms, reps = mask(terms) + cont, numer, denom = _gcd_terms(terms, isprimitive, fraction) + numer = numer.xreplace(reps) + coeff, factors = cont.as_coeff_Mul() + if not clear: + c, _coeff = coeff.as_coeff_Mul() + if not c.is_Integer and not clear and numer.is_Add: + n, d = c.as_numer_denom() + _numer = numer/d + if any(a.as_coeff_Mul()[0].is_Integer + for a in _numer.args): + numer = _numer + coeff = n*_coeff + return _keep_coeff(coeff, factors*numer/denom, clear=clear) + + if not isinstance(terms, Basic): + return terms + + if terms.is_Atom: + return terms + + if terms.is_Mul: + c, args = terms.as_coeff_mul() + return _keep_coeff(c, Mul(*[gcd_terms(i, isprimitive, clear, fraction) + for i in args]), clear=clear) + + def handle(a): + # don't treat internal args like terms of an Add + if not isinstance(a, Expr): + if isinstance(a, Basic): + if not a.args: + return a + return a.func(*[handle(i) for i in a.args]) + return type(a)([handle(i) for i in a]) + return gcd_terms(a, isprimitive, clear, fraction) + + if isinstance(terms, Dict): + return Dict(*[(k, handle(v)) for k, v in terms.args]) + return terms.func(*[handle(i) for i in terms.args]) + + +def _factor_sum_int(expr, **kwargs): + """Return Sum or Integral object with factors that are not + in the wrt variables removed. In cases where there are additive + terms in the function of the object that are independent, the + object will be separated into two objects. + + Examples + ======== + + >>> from sympy import Sum, factor_terms + >>> from sympy.abc import x, y + >>> factor_terms(Sum(x + y, (x, 1, 3))) + y*Sum(1, (x, 1, 3)) + Sum(x, (x, 1, 3)) + >>> factor_terms(Sum(x*y, (x, 1, 3))) + y*Sum(x, (x, 1, 3)) + + Notes + ===== + + If a function in the summand or integrand is replaced + with a symbol, then this simplification should not be + done or else an incorrect result will be obtained when + the symbol is replaced with an expression that depends + on the variables of summation/integration: + + >>> eq = Sum(y, (x, 1, 3)) + >>> factor_terms(eq).subs(y, x).doit() + 3*x + >>> eq.subs(y, x).doit() + 6 + """ + result = expr.function + if result == 0: + return S.Zero + limits = expr.limits + + # get the wrt variables + wrt = {i.args[0] for i in limits} + + # factor out any common terms that are independent of wrt + f = factor_terms(result, **kwargs) + i, d = f.as_independent(*wrt) + if isinstance(f, Add): + return i * expr.func(1, *limits) + expr.func(d, *limits) + else: + return i * expr.func(d, *limits) + + +def factor_terms(expr: Expr | complex, radical=False, clear=False, fraction=False, sign=True) -> Expr: + """Remove common factors from terms in all arguments without + changing the underlying structure of the expr. No expansion or + simplification (and no processing of non-commutatives) is performed. + + Parameters + ========== + + radical: bool, optional + If radical=True then a radical common to all terms will be factored + out of any Add sub-expressions of the expr. + + clear : bool, optional + If clear=False (default) then coefficients will not be separated + from a single Add if they can be distributed to leave one or more + terms with integer coefficients. + + fraction : bool, optional + If fraction=True (default is False) then a common denominator will be + constructed for the expression. + + sign : bool, optional + If sign=True (default) then even if the only factor in common is a -1, + it will be factored out of the expression. + + Examples + ======== + + >>> from sympy import factor_terms, Symbol + >>> from sympy.abc import x, y + >>> factor_terms(x + x*(2 + 4*y)**3) + x*(8*(2*y + 1)**3 + 1) + >>> A = Symbol('A', commutative=False) + >>> factor_terms(x*A + x*A + x*y*A) + x*(y*A + 2*A) + + When ``clear`` is False, a rational will only be factored out of an + Add expression if all terms of the Add have coefficients that are + fractions: + + >>> factor_terms(x/2 + 1, clear=False) + x/2 + 1 + >>> factor_terms(x/2 + 1, clear=True) + (x + 2)/2 + + If a -1 is all that can be factored out, to *not* factor it out, the + flag ``sign`` must be False: + + >>> factor_terms(-x - y) + -(x + y) + >>> factor_terms(-x - y, sign=False) + -x - y + >>> factor_terms(-2*x - 2*y, sign=False) + -2*(x + y) + + See Also + ======== + + gcd_terms, sympy.polys.polytools.terms_gcd + + """ + def do(expr): + from sympy.concrete.summations import Sum + from sympy.integrals.integrals import Integral + is_iterable = iterable(expr) + + if not isinstance(expr, Basic) or expr.is_Atom: + if is_iterable: + return type(expr)([do(i) for i in expr]) + return expr + + if expr.is_Pow or expr.is_Function or \ + is_iterable or not hasattr(expr, 'args_cnc'): + args = expr.args + newargs = tuple([do(i) for i in args]) + if newargs == args: + return expr + return expr.func(*newargs) + + if isinstance(expr, (Sum, Integral)): + return _factor_sum_int(expr, + radical=radical, clear=clear, + fraction=fraction, sign=sign) + + cont, p = expr.as_content_primitive(radical=radical, clear=clear) + if p.is_Add: + list_args = [do(a) for a in Add.make_args(p)] + # get a common negative (if there) which gcd_terms does not remove + if not any(a.as_coeff_Mul()[0].extract_multiplicatively(-1) is None + for a in list_args): + cont = -cont + list_args = [-a for a in list_args] + # watch out for exp(-(x+2)) which gcd_terms will change to exp(-x-2) + special = {} + for i, a in enumerate(list_args): + b, e = a.as_base_exp() + if e.is_Mul and e != Mul(*e.args): + list_args[i] = Dummy() + special[list_args[i]] = a + # rebuild p not worrying about the order which gcd_terms will fix + p = Add._from_args(list_args) + p = gcd_terms(p, + isprimitive=True, + clear=clear, + fraction=fraction).xreplace(special) + elif p.args: + p = p.func( + *[do(a) for a in p.args]) + rv = _keep_coeff(cont, p, clear=clear, sign=sign) + return rv + expr2 = sympify(expr) + return do(expr2) + + +def _mask_nc(eq, name=None): + """ + Return ``eq`` with non-commutative objects replaced with Dummy + symbols. A dictionary that can be used to restore the original + values is returned: if it is None, the expression is noncommutative + and cannot be made commutative. The third value returned is a list + of any non-commutative symbols that appear in the returned equation. + + Explanation + =========== + + All non-commutative objects other than Symbols are replaced with + a non-commutative Symbol. Identical objects will be identified + by identical symbols. + + If there is only 1 non-commutative object in an expression it will + be replaced with a commutative symbol. Otherwise, the non-commutative + entities are retained and the calling routine should handle + replacements in this case since some care must be taken to keep + track of the ordering of symbols when they occur within Muls. + + Parameters + ========== + + name : str + ``name``, if given, is the name that will be used with numbered Dummy + variables that will replace the non-commutative objects and is mainly + used for doctesting purposes. + + Examples + ======== + + >>> from sympy.physics.secondquant import Commutator, NO, F, Fd + >>> from sympy import symbols + >>> from sympy.core.exprtools import _mask_nc + >>> from sympy.abc import x, y + >>> A, B, C = symbols('A,B,C', commutative=False) + + One nc-symbol: + + >>> _mask_nc(A**2 - x**2, 'd') + (_d0**2 - x**2, {_d0: A}, []) + + Multiple nc-symbols: + + >>> _mask_nc(A**2 - B**2, 'd') + (A**2 - B**2, {}, [A, B]) + + An nc-object with nc-symbols but no others outside of it: + + >>> _mask_nc(1 + x*Commutator(A, B), 'd') + (_d0*x + 1, {_d0: Commutator(A, B)}, []) + >>> _mask_nc(NO(Fd(x)*F(y)), 'd') + (_d0, {_d0: NO(CreateFermion(x)*AnnihilateFermion(y))}, []) + + Multiple nc-objects: + + >>> eq = x*Commutator(A, B) + x*Commutator(A, C)*Commutator(A, B) + >>> _mask_nc(eq, 'd') + (x*_d0 + x*_d1*_d0, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1]) + + Multiple nc-objects and nc-symbols: + + >>> eq = A*Commutator(A, B) + B*Commutator(A, C) + >>> _mask_nc(eq, 'd') + (A*_d0 + B*_d1, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1, A, B]) + + """ + name = name or 'mask' + # Make Dummy() append sequential numbers to the name + + def numbered_names(): + i = 0 + while True: + yield name + str(i) + i += 1 + + names = numbered_names() + + def Dummy(*args, **kwargs): + from .symbol import Dummy + return Dummy(next(names), *args, **kwargs) + + expr = eq + if expr.is_commutative: + return eq, {}, [] + + # identify nc-objects; symbols and other + rep = [] + nc_obj = set() + nc_syms = set() + pot = preorder_traversal(expr, keys=default_sort_key) + for a in pot: + if any(a == r[0] for r in rep): + pot.skip() + elif not a.is_commutative: + if a.is_symbol: + nc_syms.add(a) + pot.skip() + elif not (a.is_Add or a.is_Mul or a.is_Pow): + nc_obj.add(a) + pot.skip() + + # If there is only one nc symbol or object, it can be factored regularly + # but polys is going to complain, so replace it with a Dummy. + if len(nc_obj) == 1 and not nc_syms: + rep.append((nc_obj.pop(), Dummy())) + elif len(nc_syms) == 1 and not nc_obj: + rep.append((nc_syms.pop(), Dummy())) + + # Any remaining nc-objects will be replaced with an nc-Dummy and + # identified as an nc-Symbol to watch out for + nc_obj = sorted(nc_obj, key=default_sort_key) + for n in nc_obj: + nc = Dummy(commutative=False) + rep.append((n, nc)) + nc_syms.add(nc) + expr = expr.subs(rep) + + nc_syms = list(nc_syms) + nc_syms.sort(key=default_sort_key) + return expr, {v: k for k, v in rep}, nc_syms + + +def factor_nc(expr): + """Return the factored form of ``expr`` while handling non-commutative + expressions. + + Examples + ======== + + >>> from sympy import factor_nc, Symbol + >>> from sympy.abc import x + >>> A = Symbol('A', commutative=False) + >>> B = Symbol('B', commutative=False) + >>> factor_nc((x**2 + 2*A*x + A**2).expand()) + (x + A)**2 + >>> factor_nc(((x + A)*(x + B)).expand()) + (x + A)*(x + B) + """ + expr = sympify(expr) + if not isinstance(expr, Expr) or not expr.args: + return expr + if not expr.is_Add: + return expr.func(*[factor_nc(a) for a in expr.args]) + expr = expr.func(*[expand_power_exp(i) for i in expr.args]) + + from sympy.polys.polytools import gcd, factor + expr, rep, nc_symbols = _mask_nc(expr) + + if rep: + return factor(expr).subs(rep) + else: + args = [a.args_cnc() for a in Add.make_args(expr)] + c = g = l = r = S.One + hit = False + # find any commutative gcd term + for i, a in enumerate(args): + if i == 0: + c = Mul._from_args(a[0]) + elif a[0]: + c = gcd(c, Mul._from_args(a[0])) + else: + c = S.One + if c is not S.One: + hit = True + c, g = c.as_coeff_Mul() + if g is not S.One: + for i, (cc, _) in enumerate(args): + cc = list(Mul.make_args(Mul._from_args(list(cc))/g)) + args[i][0] = cc + for i, (cc, _) in enumerate(args): + if cc: + cc[0] = cc[0]/c + else: + cc = [1/c] + args[i][0] = cc + # find any noncommutative common prefix + for i, a in enumerate(args): + if i == 0: + n = a[1][:] + else: + n = common_prefix(n, a[1]) + if not n: + # is there a power that can be extracted? + if not args[0][1]: + break + b, e = args[0][1][0].as_base_exp() + ok = False + if e.is_Integer: + for t in args: + if not t[1]: + break + bt, et = t[1][0].as_base_exp() + if et.is_Integer and bt == b: + e = min(e, et) + else: + break + else: + ok = hit = True + l = b**e + il = b**-e + for _ in args: + _[1][0] = il*_[1][0] + break + if not ok: + break + else: + hit = True + lenn = len(n) + l = Mul(*n) + for _ in args: + _[1] = _[1][lenn:] + # find any noncommutative common suffix + for i, a in enumerate(args): + if i == 0: + n = a[1][:] + else: + n = common_suffix(n, a[1]) + if not n: + # is there a power that can be extracted? + if not args[0][1]: + break + b, e = args[0][1][-1].as_base_exp() + ok = False + if e.is_Integer: + for t in args: + if not t[1]: + break + bt, et = t[1][-1].as_base_exp() + if et.is_Integer and bt == b: + e = min(e, et) + else: + break + else: + ok = hit = True + r = b**e + il = b**-e + for _ in args: + _[1][-1] = _[1][-1]*il + break + if not ok: + break + else: + hit = True + lenn = len(n) + r = Mul(*n) + for _ in args: + _[1] = _[1][:len(_[1]) - lenn] + if hit: + mid = Add(*[Mul(*cc)*Mul(*nc) for cc, nc in args]) + else: + mid = expr + + from sympy.simplify.powsimp import powsimp + + # sort the symbols so the Dummys would appear in the same + # order as the original symbols, otherwise you may introduce + # a factor of -1, e.g. A**2 - B**2) -- {A:y, B:x} --> y**2 - x**2 + # and the former factors into two terms, (A - B)*(A + B) while the + # latter factors into 3 terms, (-1)*(x - y)*(x + y) + rep1 = [(n, Dummy()) for n in sorted(nc_symbols, key=default_sort_key)] + unrep1 = [(v, k) for k, v in rep1] + unrep1.reverse() + new_mid, r2, _ = _mask_nc(mid.subs(rep1)) + new_mid = powsimp(factor(new_mid)) + + new_mid = new_mid.subs(r2).subs(unrep1) + + if new_mid.is_Pow: + return _keep_coeff(c, g*l*new_mid*r) + + if new_mid.is_Mul: + def _pemexpand(expr): + "Expand with the minimal set of hints necessary to check the result." + return expr.expand(deep=True, mul=True, power_exp=True, + power_base=False, basic=False, multinomial=True, log=False) + # XXX TODO there should be a way to inspect what order the terms + # must be in and just select the plausible ordering without + # checking permutations + cfac = [] + ncfac = [] + for f in new_mid.args: + if f.is_commutative: + cfac.append(f) + else: + b, e = f.as_base_exp() + if e.is_Integer: + ncfac.extend([b]*e) + else: + ncfac.append(f) + pre_mid = g*Mul(*cfac)*l + target = _pemexpand(expr/c) + for s in variations(ncfac, len(ncfac)): + ok = pre_mid*Mul(*s)*r + if _pemexpand(ok) == target: + return _keep_coeff(c, ok) + + # mid was an Add that didn't factor successfully + return _keep_coeff(c, g*l*mid*r) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/facts.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/facts.py new file mode 100644 index 0000000000000000000000000000000000000000..0b98d9b14bbac661d3c0fd1d1fd87977a792fb74 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/facts.py @@ -0,0 +1,634 @@ +r"""This is rule-based deduction system for SymPy + +The whole thing is split into two parts + + - rules compilation and preparation of tables + - runtime inference + +For rule-based inference engines, the classical work is RETE algorithm [1], +[2] Although we are not implementing it in full (or even significantly) +it's still worth a read to understand the underlying ideas. + +In short, every rule in a system of rules is one of two forms: + + - atom -> ... (alpha rule) + - And(atom1, atom2, ...) -> ... (beta rule) + + +The major complexity is in efficient beta-rules processing and usually for an +expert system a lot of effort goes into code that operates on beta-rules. + + +Here we take minimalistic approach to get something usable first. + + - (preparation) of alpha- and beta- networks, everything except + - (runtime) FactRules.deduce_all_facts + + _____________________________________ + ( Kirr: I've never thought that doing ) + ( logic stuff is that difficult... ) + ------------------------------------- + o ^__^ + o (oo)\_______ + (__)\ )\/\ + ||----w | + || || + + +Some references on the topic +---------------------------- + +[1] https://en.wikipedia.org/wiki/Rete_algorithm +[2] http://reports-archive.adm.cs.cmu.edu/anon/1995/CMU-CS-95-113.pdf + +https://en.wikipedia.org/wiki/Propositional_formula +https://en.wikipedia.org/wiki/Inference_rule +https://en.wikipedia.org/wiki/List_of_rules_of_inference +""" + +from collections import defaultdict +from typing import Iterator + +from .logic import Logic, And, Or, Not + + +def _base_fact(atom): + """Return the literal fact of an atom. + + Effectively, this merely strips the Not around a fact. + """ + if isinstance(atom, Not): + return atom.arg + else: + return atom + + +def _as_pair(atom): + if isinstance(atom, Not): + return (atom.arg, False) + else: + return (atom, True) + +# XXX this prepares forward-chaining rules for alpha-network + + +def transitive_closure(implications): + """ + Computes the transitive closure of a list of implications + + Uses Warshall's algorithm, as described at + http://www.cs.hope.edu/~cusack/Notes/Notes/DiscreteMath/Warshall.pdf. + """ + full_implications = set(implications) + literals = set().union(*map(set, full_implications)) + + for k in literals: + for i in literals: + if (i, k) in full_implications: + for j in literals: + if (k, j) in full_implications: + full_implications.add((i, j)) + + return full_implications + + +def deduce_alpha_implications(implications): + """deduce all implications + + Description by example + ---------------------- + + given set of logic rules: + + a -> b + b -> c + + we deduce all possible rules: + + a -> b, c + b -> c + + + implications: [] of (a,b) + return: {} of a -> set([b, c, ...]) + """ + implications = implications + [(Not(j), Not(i)) for (i, j) in implications] + res = defaultdict(set) + full_implications = transitive_closure(implications) + for a, b in full_implications: + if a == b: + continue # skip a->a cyclic input + + res[a].add(b) + + # Clean up tautologies and check consistency + for a, impl in res.items(): + impl.discard(a) + na = Not(a) + if na in impl: + raise ValueError( + 'implications are inconsistent: %s -> %s %s' % (a, na, impl)) + + return res + + +def apply_beta_to_alpha_route(alpha_implications, beta_rules): + """apply additional beta-rules (And conditions) to already-built + alpha implication tables + + TODO: write about + + - static extension of alpha-chains + - attaching refs to beta-nodes to alpha chains + + + e.g. + + alpha_implications: + + a -> [b, !c, d] + b -> [d] + ... + + + beta_rules: + + &(b,d) -> e + + + then we'll extend a's rule to the following + + a -> [b, !c, d, e] + """ + x_impl = {} + for x in alpha_implications.keys(): + x_impl[x] = (set(alpha_implications[x]), []) + for bcond, bimpl in beta_rules: + for bk in bcond.args: + if bk in x_impl: + continue + x_impl[bk] = (set(), []) + + # static extensions to alpha rules: + # A: x -> a,b B: &(a,b) -> c ==> A: x -> a,b,c + seen_static_extension = True + while seen_static_extension: + seen_static_extension = False + + for bcond, bimpl in beta_rules: + if not isinstance(bcond, And): + raise TypeError("Cond is not And") + bargs = set(bcond.args) + for x, (ximpls, bb) in x_impl.items(): + x_all = ximpls | {x} + # A: ... -> a B: &(...) -> a is non-informative + if bimpl not in x_all and bargs.issubset(x_all): + ximpls.add(bimpl) + + # we introduced new implication - now we have to restore + # completeness of the whole set. + bimpl_impl = x_impl.get(bimpl) + if bimpl_impl is not None: + ximpls |= bimpl_impl[0] + seen_static_extension = True + + # attach beta-nodes which can be possibly triggered by an alpha-chain + for bidx, (bcond, bimpl) in enumerate(beta_rules): + bargs = set(bcond.args) + for x, (ximpls, bb) in x_impl.items(): + x_all = ximpls | {x} + # A: ... -> a B: &(...) -> a (non-informative) + if bimpl in x_all: + continue + # A: x -> a... B: &(!a,...) -> ... (will never trigger) + # A: x -> a... B: &(...) -> !a (will never trigger) + if any(Not(xi) in bargs or Not(xi) == bimpl for xi in x_all): + continue + + if bargs & x_all: + bb.append(bidx) + + return x_impl + + +def rules_2prereq(rules): + """build prerequisites table from rules + + Description by example + ---------------------- + + given set of logic rules: + + a -> b, c + b -> c + + we build prerequisites (from what points something can be deduced): + + b <- a + c <- a, b + + rules: {} of a -> [b, c, ...] + return: {} of c <- [a, b, ...] + + Note however, that this prerequisites may be *not* enough to prove a + fact. An example is 'a -> b' rule, where prereq(a) is b, and prereq(b) + is a. That's because a=T -> b=T, and b=F -> a=F, but a=F -> b=? + """ + prereq = defaultdict(set) + for (a, _), impl in rules.items(): + if isinstance(a, Not): + a = a.args[0] + for (i, _) in impl: + if isinstance(i, Not): + i = i.args[0] + prereq[i].add(a) + return prereq + +################ +# RULES PROVER # +################ + + +class TautologyDetected(Exception): + """(internal) Prover uses it for reporting detected tautology""" + pass + + +class Prover: + """ai - prover of logic rules + + given a set of initial rules, Prover tries to prove all possible rules + which follow from given premises. + + As a result proved_rules are always either in one of two forms: alpha or + beta: + + Alpha rules + ----------- + + This are rules of the form:: + + a -> b & c & d & ... + + + Beta rules + ---------- + + This are rules of the form:: + + &(a,b,...) -> c & d & ... + + + i.e. beta rules are join conditions that say that something follows when + *several* facts are true at the same time. + """ + + def __init__(self): + self.proved_rules = [] + self._rules_seen = set() + + def split_alpha_beta(self): + """split proved rules into alpha and beta chains""" + rules_alpha = [] # a -> b + rules_beta = [] # &(...) -> b + for a, b in self.proved_rules: + if isinstance(a, And): + rules_beta.append((a, b)) + else: + rules_alpha.append((a, b)) + return rules_alpha, rules_beta + + @property + def rules_alpha(self): + return self.split_alpha_beta()[0] + + @property + def rules_beta(self): + return self.split_alpha_beta()[1] + + def process_rule(self, a, b): + """process a -> b rule""" # TODO write more? + if (not a) or isinstance(b, bool): + return + if isinstance(a, bool): + return + if (a, b) in self._rules_seen: + return + else: + self._rules_seen.add((a, b)) + + # this is the core of processing + try: + self._process_rule(a, b) + except TautologyDetected: + pass + + def _process_rule(self, a, b): + # right part first + + # a -> b & c --> a -> b ; a -> c + # (?) FIXME this is only correct when b & c != null ! + + if isinstance(b, And): + sorted_bargs = sorted(b.args, key=str) + for barg in sorted_bargs: + self.process_rule(a, barg) + + # a -> b | c --> !b & !c -> !a + # --> a & !b -> c + # --> a & !c -> b + elif isinstance(b, Or): + sorted_bargs = sorted(b.args, key=str) + # detect tautology first + if not isinstance(a, Logic): # Atom + # tautology: a -> a|c|... + if a in sorted_bargs: + raise TautologyDetected(a, b, 'a -> a|c|...') + self.process_rule(And(*[Not(barg) for barg in b.args]), Not(a)) + + for bidx in range(len(sorted_bargs)): + barg = sorted_bargs[bidx] + brest = sorted_bargs[:bidx] + sorted_bargs[bidx + 1:] + self.process_rule(And(a, Not(barg)), Or(*brest)) + + # left part + + # a & b -> c --> IRREDUCIBLE CASE -- WE STORE IT AS IS + # (this will be the basis of beta-network) + elif isinstance(a, And): + sorted_aargs = sorted(a.args, key=str) + if b in sorted_aargs: + raise TautologyDetected(a, b, 'a & b -> a') + self.proved_rules.append((a, b)) + # XXX NOTE at present we ignore !c -> !a | !b + + elif isinstance(a, Or): + sorted_aargs = sorted(a.args, key=str) + if b in sorted_aargs: + raise TautologyDetected(a, b, 'a | b -> a') + for aarg in sorted_aargs: + self.process_rule(aarg, b) + + else: + # both `a` and `b` are atoms + self.proved_rules.append((a, b)) # a -> b + self.proved_rules.append((Not(b), Not(a))) # !b -> !a + +######################################## + + +class FactRules: + """Rules that describe how to deduce facts in logic space + + When defined, these rules allow implications to quickly be determined + for a set of facts. For this precomputed deduction tables are used. + see `deduce_all_facts` (forward-chaining) + + Also it is possible to gather prerequisites for a fact, which is tried + to be proven. (backward-chaining) + + + Definition Syntax + ----------------- + + a -> b -- a=T -> b=T (and automatically b=F -> a=F) + a -> !b -- a=T -> b=F + a == b -- a -> b & b -> a + a -> b & c -- a=T -> b=T & c=T + # TODO b | c + + + Internals + --------- + + .full_implications[k, v]: all the implications of fact k=v + .beta_triggers[k, v]: beta rules that might be triggered when k=v + .prereq -- {} k <- [] of k's prerequisites + + .defined_facts -- set of defined fact names + """ + + def __init__(self, rules): + """Compile rules into internal lookup tables""" + + if isinstance(rules, str): + rules = rules.splitlines() + + # --- parse and process rules --- + P = Prover() + + for rule in rules: + # XXX `a` is hardcoded to be always atom + a, op, b = rule.split(None, 2) + + a = Logic.fromstring(a) + b = Logic.fromstring(b) + + if op == '->': + P.process_rule(a, b) + elif op == '==': + P.process_rule(a, b) + P.process_rule(b, a) + else: + raise ValueError('unknown op %r' % op) + + # --- build deduction networks --- + self.beta_rules = [] + for bcond, bimpl in P.rules_beta: + self.beta_rules.append( + ({_as_pair(a) for a in bcond.args}, _as_pair(bimpl))) + + # deduce alpha implications + impl_a = deduce_alpha_implications(P.rules_alpha) + + # now: + # - apply beta rules to alpha chains (static extension), and + # - further associate beta rules to alpha chain (for inference + # at runtime) + impl_ab = apply_beta_to_alpha_route(impl_a, P.rules_beta) + + # extract defined fact names + self.defined_facts = {_base_fact(k) for k in impl_ab.keys()} + + # build rels (forward chains) + full_implications = defaultdict(set) + beta_triggers = defaultdict(set) + for k, (impl, betaidxs) in impl_ab.items(): + full_implications[_as_pair(k)] = {_as_pair(i) for i in impl} + beta_triggers[_as_pair(k)] = betaidxs + + self.full_implications = full_implications + self.beta_triggers = beta_triggers + + # build prereq (backward chains) + prereq = defaultdict(set) + rel_prereq = rules_2prereq(full_implications) + for k, pitems in rel_prereq.items(): + prereq[k] |= pitems + self.prereq = prereq + + def _to_python(self) -> str: + """ Generate a string with plain python representation of the instance """ + return '\n'.join(self.print_rules()) + + @classmethod + def _from_python(cls, data : dict): + """ Generate an instance from the plain python representation """ + self = cls('') + for key in ['full_implications', 'beta_triggers', 'prereq']: + d=defaultdict(set) + d.update(data[key]) + setattr(self, key, d) + self.beta_rules = data['beta_rules'] + self.defined_facts = set(data['defined_facts']) + + return self + + def _defined_facts_lines(self): + yield 'defined_facts = [' + for fact in sorted(self.defined_facts): + yield f' {fact!r},' + yield '] # defined_facts' + + def _full_implications_lines(self): + yield 'full_implications = dict( [' + for fact in sorted(self.defined_facts): + for value in (True, False): + yield f' # Implications of {fact} = {value}:' + yield f' (({fact!r}, {value!r}), set( (' + implications = self.full_implications[(fact, value)] + for implied in sorted(implications): + yield f' {implied!r},' + yield ' ) ),' + yield ' ),' + yield ' ] ) # full_implications' + + def _prereq_lines(self): + yield 'prereq = {' + yield '' + for fact in sorted(self.prereq): + yield f' # facts that could determine the value of {fact}' + yield f' {fact!r}: {{' + for pfact in sorted(self.prereq[fact]): + yield f' {pfact!r},' + yield ' },' + yield '' + yield '} # prereq' + + def _beta_rules_lines(self): + reverse_implications = defaultdict(list) + for n, (pre, implied) in enumerate(self.beta_rules): + reverse_implications[implied].append((pre, n)) + + yield '# Note: the order of the beta rules is used in the beta_triggers' + yield 'beta_rules = [' + yield '' + m = 0 + indices = {} + for implied in sorted(reverse_implications): + fact, value = implied + yield f' # Rules implying {fact} = {value}' + for pre, n in reverse_implications[implied]: + indices[n] = m + m += 1 + setstr = ", ".join(map(str, sorted(pre))) + yield f' ({{{setstr}}},' + yield f' {implied!r}),' + yield '' + yield '] # beta_rules' + + yield 'beta_triggers = {' + for query in sorted(self.beta_triggers): + fact, value = query + triggers = [indices[n] for n in self.beta_triggers[query]] + yield f' {query!r}: {triggers!r},' + yield '} # beta_triggers' + + def print_rules(self) -> Iterator[str]: + """ Returns a generator with lines to represent the facts and rules """ + yield from self._defined_facts_lines() + yield '' + yield '' + yield from self._full_implications_lines() + yield '' + yield '' + yield from self._prereq_lines() + yield '' + yield '' + yield from self._beta_rules_lines() + yield '' + yield '' + yield "generated_assumptions = {'defined_facts': defined_facts, 'full_implications': full_implications," + yield " 'prereq': prereq, 'beta_rules': beta_rules, 'beta_triggers': beta_triggers}" + + +class InconsistentAssumptions(ValueError): + def __str__(self): + kb, fact, value = self.args + return "%s, %s=%s" % (kb, fact, value) + + +class FactKB(dict): + """ + A simple propositional knowledge base relying on compiled inference rules. + """ + def __str__(self): + return '{\n%s}' % ',\n'.join( + ["\t%s: %s" % i for i in sorted(self.items())]) + + def __init__(self, rules): + self.rules = rules + + def _tell(self, k, v): + """Add fact k=v to the knowledge base. + + Returns True if the KB has actually been updated, False otherwise. + """ + if k in self and self[k] is not None: + if self[k] == v: + return False + else: + raise InconsistentAssumptions(self, k, v) + else: + self[k] = v + return True + + # ********************************************* + # * This is the workhorse, so keep it *fast*. * + # ********************************************* + def deduce_all_facts(self, facts): + """ + Update the KB with all the implications of a list of facts. + + Facts can be specified as a dictionary or as a list of (key, value) + pairs. + """ + # keep frequently used attributes locally, so we'll avoid extra + # attribute access overhead + full_implications = self.rules.full_implications + beta_triggers = self.rules.beta_triggers + beta_rules = self.rules.beta_rules + + if isinstance(facts, dict): + facts = facts.items() + + while facts: + beta_maytrigger = set() + + # --- alpha chains --- + for k, v in facts: + if not self._tell(k, v) or v is None: + continue + + # lookup routing tables + for key, value in full_implications[k, v]: + self._tell(key, value) + + beta_maytrigger.update(beta_triggers[k, v]) + + # --- beta chains --- + facts = [] + for bidx in beta_maytrigger: + bcond, bimpl = beta_rules[bidx] + if all(self.get(k) is v for k, v in bcond): + facts.append(bimpl) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/function.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/function.py new file mode 100644 index 0000000000000000000000000000000000000000..ac850845e0bb2aaf9b535635567d6e2629527ad7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/function.py @@ -0,0 +1,3423 @@ +""" +There are three types of functions implemented in SymPy: + + 1) defined functions (in the sense that they can be evaluated) like + exp or sin; they have a name and a body: + f = exp + 2) undefined function which have a name but no body. Undefined + functions can be defined using a Function class as follows: + f = Function('f') + (the result will be a Function instance) + 3) anonymous function (or lambda function) which have a body (defined + with dummy variables) but have no name: + f = Lambda(x, exp(x)*x) + f = Lambda((x, y), exp(x)*y) + The fourth type of functions are composites, like (sin + cos)(x); these work in + SymPy core, but are not yet part of SymPy. + + Examples + ======== + + >>> import sympy + >>> f = sympy.Function("f") + >>> from sympy.abc import x + >>> f(x) + f(x) + >>> print(sympy.srepr(f(x).func)) + Function('f') + >>> f(x).args + (x,) + +""" + +from __future__ import annotations + +from typing import Any +from collections.abc import Iterable +import copyreg + +from .add import Add +from .basic import Basic, _atomic +from .cache import cacheit +from .containers import Tuple, Dict +from .decorators import _sympifyit +from .evalf import pure_complex +from .expr import Expr, AtomicExpr +from .logic import fuzzy_and, fuzzy_or, fuzzy_not, FuzzyBool +from .mul import Mul +from .numbers import Rational, Float, Integer +from .operations import LatticeOp +from .parameters import global_parameters +from .rules import Transform +from .singleton import S +from .sympify import sympify, _sympify + +from .sorting import default_sort_key, ordered +from sympy.utilities.exceptions import (sympy_deprecation_warning, + SymPyDeprecationWarning, ignore_warnings) +from sympy.utilities.iterables import (has_dups, sift, iterable, + is_sequence, uniq, topological_sort) +from sympy.utilities.lambdify import MPMATH_TRANSLATIONS +from sympy.utilities.misc import as_int, filldedent, func_name + +import mpmath +from mpmath.libmp.libmpf import prec_to_dps + +import inspect +from collections import Counter + +def _coeff_isneg(a): + """Return True if the leading Number is negative. + + Examples + ======== + + >>> from sympy.core.function import _coeff_isneg + >>> from sympy import S, Symbol, oo, pi + >>> _coeff_isneg(-3*pi) + True + >>> _coeff_isneg(S(3)) + False + >>> _coeff_isneg(-oo) + True + >>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1 + False + + For matrix expressions: + + >>> from sympy import MatrixSymbol, sqrt + >>> A = MatrixSymbol("A", 3, 3) + >>> _coeff_isneg(-sqrt(2)*A) + True + >>> _coeff_isneg(sqrt(2)*A) + False + """ + + if a.is_MatMul: + a = a.args[0] + if a.is_Mul: + a = a.args[0] + return a.is_Number and a.is_extended_negative + + +class PoleError(Exception): + pass + + +class ArgumentIndexError(ValueError): + def __str__(self): + return ("Invalid operation with argument number %s for Function %s" % + (self.args[1], self.args[0])) + + +class BadSignatureError(TypeError): + '''Raised when a Lambda is created with an invalid signature''' + pass + + +class BadArgumentsError(TypeError): + '''Raised when a Lambda is called with an incorrect number of arguments''' + pass + + +# Python 3 version that does not raise a Deprecation warning +def arity(cls): + """Return the arity of the function if it is known, else None. + + Explanation + =========== + + When default values are specified for some arguments, they are + optional and the arity is reported as a tuple of possible values. + + Examples + ======== + + >>> from sympy import arity, log + >>> arity(lambda x: x) + 1 + >>> arity(log) + (1, 2) + >>> arity(lambda *x: sum(x)) is None + True + """ + eval_ = getattr(cls, 'eval', cls) + + parameters = inspect.signature(eval_).parameters.items() + if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]: + return + p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD] + # how many have no default and how many have a default value + no, yes = map(len, sift(p_or_k, + lambda p:p.default == p.empty, binary=True)) + return no if not yes else tuple(range(no, no + yes + 1)) + +class FunctionClass(type): + """ + Base class for function classes. FunctionClass is a subclass of type. + + Use Function('' [ , signature ]) to create + undefined function classes. + """ + _new = type.__new__ + + def __init__(cls, *args, **kwargs): + # honor kwarg value or class-defined value before using + # the number of arguments in the eval function (if present) + nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls))) + if nargs is None and 'nargs' not in cls.__dict__: + for supcls in cls.__mro__: + if hasattr(supcls, '_nargs'): + nargs = supcls._nargs + break + else: + continue + + # Canonicalize nargs here; change to set in nargs. + if is_sequence(nargs): + if not nargs: + raise ValueError(filldedent(''' + Incorrectly specified nargs as %s: + if there are no arguments, it should be + `nargs = 0`; + if there are any number of arguments, + it should be + `nargs = None`''' % str(nargs))) + nargs = tuple(ordered(set(nargs))) + elif nargs is not None: + nargs = (as_int(nargs),) + cls._nargs = nargs + + # When __init__ is called from UndefinedFunction it is called with + # just one arg but when it is called from subclassing Function it is + # called with the usual (name, bases, namespace) type() signature. + if len(args) == 3: + namespace = args[2] + if 'eval' in namespace and not isinstance(namespace['eval'], classmethod): + raise TypeError("eval on Function subclasses should be a class method (defined with @classmethod)") + + @property + def __signature__(self): + """ + Allow Python 3's inspect.signature to give a useful signature for + Function subclasses. + """ + # Python 3 only, but backports (like the one in IPython) still might + # call this. + try: + from inspect import signature + except ImportError: + return None + + # TODO: Look at nargs + return signature(self.eval) + + @property + def free_symbols(self): + return set() + + @property + def xreplace(self): + # Function needs args so we define a property that returns + # a function that takes args...and then use that function + # to return the right value + return lambda rule, **_: rule.get(self, self) + + @property + def nargs(self): + """Return a set of the allowed number of arguments for the function. + + Examples + ======== + + >>> from sympy import Function + >>> f = Function('f') + + If the function can take any number of arguments, the set of whole + numbers is returned: + + >>> Function('f').nargs + Naturals0 + + If the function was initialized to accept one or more arguments, a + corresponding set will be returned: + + >>> Function('f', nargs=1).nargs + {1} + >>> Function('f', nargs=(2, 1)).nargs + {1, 2} + + The undefined function, after application, also has the nargs + attribute; the actual number of arguments is always available by + checking the ``args`` attribute: + + >>> f = Function('f') + >>> f(1).nargs + Naturals0 + >>> len(f(1).args) + 1 + """ + from sympy.sets.sets import FiniteSet + # XXX it would be nice to handle this in __init__ but there are import + # problems with trying to import FiniteSet there + return FiniteSet(*self._nargs) if self._nargs else S.Naturals0 + + def _valid_nargs(self, n : int) -> bool: + """ Return True if the specified integer is a valid number of arguments + + The number of arguments n is guaranteed to be an integer and positive + + """ + if self._nargs: + return n in self._nargs + + nargs = self.nargs + return nargs is S.Naturals0 or n in nargs + + def __repr__(cls): + return cls.__name__ + + +class Application(Basic, metaclass=FunctionClass): + """ + Base class for applied functions. + + Explanation + =========== + + Instances of Application represent the result of applying an application of + any type to any object. + """ + + is_Function = True + + @cacheit + def __new__(cls, *args, **options): + from sympy.sets.fancysets import Naturals0 + from sympy.sets.sets import FiniteSet + + args = list(map(sympify, args)) + evaluate = options.pop('evaluate', global_parameters.evaluate) + # WildFunction (and anything else like it) may have nargs defined + # and we throw that value away here + options.pop('nargs', None) + + if options: + raise ValueError("Unknown options: %s" % options) + + if evaluate: + evaluated = cls.eval(*args) + if evaluated is not None: + return evaluated + + obj = super().__new__(cls, *args, **options) + + # make nargs uniform here + sentinel = object() + objnargs = getattr(obj, "nargs", sentinel) + if objnargs is not sentinel: + # things passing through here: + # - functions subclassed from Function (e.g. myfunc(1).nargs) + # - functions like cos(1).nargs + # - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs + # Canonicalize nargs here + if is_sequence(objnargs): + nargs = tuple(ordered(set(objnargs))) + elif objnargs is not None: + nargs = (as_int(objnargs),) + else: + nargs = None + else: + # things passing through here: + # - WildFunction('f').nargs + # - AppliedUndef with no nargs like Function('f')(1).nargs + nargs = obj._nargs # note the underscore here + # convert to FiniteSet + obj.nargs = FiniteSet(*nargs) if nargs else Naturals0() + return obj + + @classmethod + def eval(cls, *args): + """ + Returns a canonical form of cls applied to arguments args. + + Explanation + =========== + + The ``eval()`` method is called when the class ``cls`` is about to be + instantiated and it should return either some simplified instance + (possible of some other class), or if the class ``cls`` should be + unmodified, return None. + + Examples of ``eval()`` for the function "sign" + + .. code-block:: python + + @classmethod + def eval(cls, arg): + if arg is S.NaN: + return S.NaN + if arg.is_zero: return S.Zero + if arg.is_positive: return S.One + if arg.is_negative: return S.NegativeOne + if isinstance(arg, Mul): + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff is not S.One: + return cls(coeff) * cls(terms) + + """ + return + + @property + def func(self): + return self.__class__ + + def _eval_subs(self, old, new): + if (old.is_Function and new.is_Function and + callable(old) and callable(new) and + old == self.func and len(self.args) in new.nargs): + return new(*[i._subs(old, new) for i in self.args]) + + +class Function(Application, Expr): + r""" + Base class for applied mathematical functions. + + It also serves as a constructor for undefined function classes. + + See the :ref:`custom-functions` guide for details on how to subclass + ``Function`` and what methods can be defined. + + Examples + ======== + + **Undefined Functions** + + To create an undefined function, pass a string of the function name to + ``Function``. + + >>> from sympy import Function, Symbol + >>> x = Symbol('x') + >>> f = Function('f') + >>> g = Function('g')(x) + >>> f + f + >>> f(x) + f(x) + >>> g + g(x) + >>> f(x).diff(x) + Derivative(f(x), x) + >>> g.diff(x) + Derivative(g(x), x) + + Assumptions can be passed to ``Function`` the same as with a + :class:`~.Symbol`. Alternatively, you can use a ``Symbol`` with + assumptions for the function name and the function will inherit the name + and assumptions associated with the ``Symbol``: + + >>> f_real = Function('f', real=True) + >>> f_real(x).is_real + True + >>> f_real_inherit = Function(Symbol('f', real=True)) + >>> f_real_inherit(x).is_real + True + + Note that assumptions on a function are unrelated to the assumptions on + the variables it is called on. If you want to add a relationship, subclass + ``Function`` and define custom assumptions handler methods. See the + :ref:`custom-functions-assumptions` section of the :ref:`custom-functions` + guide for more details. + + **Custom Function Subclasses** + + The :ref:`custom-functions` guide has several + :ref:`custom-functions-complete-examples` of how to subclass ``Function`` + to create a custom function. + + """ + + @property + def _diff_wrt(self): + return False + + @cacheit + def __new__(cls, *args, **options) -> type[AppliedUndef]: # type: ignore + # Handle calls like Function('f') + if cls is Function: + return UndefinedFunction(*args, **options) # type: ignore + else: + return cls._new_(*args, **options) # type: ignore + + @classmethod + def _new_(cls, *args, **options) -> Expr: + n = len(args) + + if not cls._valid_nargs(n): + # XXX: exception message must be in exactly this format to + # make it work with NumPy's functions like vectorize(). See, + # for example, https://github.com/numpy/numpy/issues/1697. + # The ideal solution would be just to attach metadata to + # the exception and change NumPy to take advantage of this. + temp = ('%(name)s takes %(qual)s %(args)s ' + 'argument%(plural)s (%(given)s given)') + raise TypeError(temp % { + 'name': cls, + 'qual': 'exactly' if len(cls.nargs) == 1 else 'at least', + 'args': min(cls.nargs), + 'plural': 's'*(min(cls.nargs) != 1), + 'given': n}) + + evaluate = options.get('evaluate', global_parameters.evaluate) + result = super().__new__(cls, *args, **options) + if evaluate and isinstance(result, cls) and result.args: + _should_evalf = [cls._should_evalf(a) for a in result.args] + pr2 = min(_should_evalf) + if pr2 > 0: + pr = max(_should_evalf) + result = result.evalf(prec_to_dps(pr)) + + return _sympify(result) + + @classmethod + def _should_evalf(cls, arg): + """ + Decide if the function should automatically evalf(). + + Explanation + =========== + + By default (in this implementation), this happens if (and only if) the + ARG is a floating point number (including complex numbers). + This function is used by __new__. + + Returns the precision to evalf to, or -1 if it should not evalf. + """ + if arg.is_Float: + return arg._prec + if not arg.is_Add: + return -1 + m = pure_complex(arg) + if m is None: + return -1 + # the elements of m are of type Number, so have a _prec + return max(m[0]._prec, m[1]._prec) + + @classmethod + def class_key(cls): + from sympy.sets.fancysets import Naturals0 + funcs = { + 'exp': 10, + 'log': 11, + 'sin': 20, + 'cos': 21, + 'tan': 22, + 'cot': 23, + 'sinh': 30, + 'cosh': 31, + 'tanh': 32, + 'coth': 33, + 'conjugate': 40, + 're': 41, + 'im': 42, + 'arg': 43, + } + name = cls.__name__ + + try: + i = funcs[name] + except KeyError: + i = 0 if isinstance(cls.nargs, Naturals0) else 10000 + + return 4, i, name + + def _eval_evalf(self, prec): + + def _get_mpmath_func(fname): + """Lookup mpmath function based on name""" + if isinstance(self, AppliedUndef): + # Shouldn't lookup in mpmath but might have ._imp_ + return None + + if not hasattr(mpmath, fname): + fname = MPMATH_TRANSLATIONS.get(fname, None) + if fname is None: + return None + return getattr(mpmath, fname) + + _eval_mpmath = getattr(self, '_eval_mpmath', None) + if _eval_mpmath is None: + func = _get_mpmath_func(self.func.__name__) + args = self.args + else: + func, args = _eval_mpmath() + + # Fall-back evaluation + if func is None: + imp = getattr(self, '_imp_', None) + if imp is None: + return None + try: + return Float(imp(*[i.evalf(prec) for i in self.args]), prec) + except (TypeError, ValueError): + return None + + # Convert all args to mpf or mpc + # Convert the arguments to *higher* precision than requested for the + # final result. + # XXX + 5 is a guess, it is similar to what is used in evalf.py. Should + # we be more intelligent about it? + try: + args = [arg._to_mpmath(prec + 5) for arg in args] + def bad(m): + from mpmath import mpf, mpc + # the precision of an mpf value is the last element + # if that is 1 (and m[1] is not 1 which would indicate a + # power of 2), then the eval failed; so check that none of + # the arguments failed to compute to a finite precision. + # Note: An mpc value has two parts, the re and imag tuple; + # check each of those parts, too. Anything else is allowed to + # pass + if isinstance(m, mpf): + m = m._mpf_ + return m[1] !=1 and m[-1] == 1 + elif isinstance(m, mpc): + m, n = m._mpc_ + return m[1] !=1 and m[-1] == 1 and \ + n[1] !=1 and n[-1] == 1 + else: + return False + if any(bad(a) for a in args): + raise ValueError # one or more args failed to compute with significance + except ValueError: + return + + with mpmath.workprec(prec): + v = func(*args) + + return Expr._from_mpmath(v, prec) + + def _eval_derivative(self, s): + # f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s) + i = 0 + l = [] + for a in self.args: + i += 1 + da = a.diff(s) + if da.is_zero: + continue + try: + df = self.fdiff(i) + except ArgumentIndexError: + df = Function.fdiff(self, i) + l.append(df * da) + return Add(*l) + + def _eval_is_commutative(self): + return fuzzy_and(a.is_commutative for a in self.args) + + def _eval_is_meromorphic(self, x, a): + if not self.args: + return True + if any(arg.has(x) for arg in self.args[1:]): + return False + + arg = self.args[0] + if not arg._eval_is_meromorphic(x, a): + return None + + return fuzzy_not(type(self).is_singular(arg.subs(x, a))) + + _singularities: FuzzyBool | tuple[Expr, ...] = None + + @classmethod + def is_singular(cls, a): + """ + Tests whether the argument is an essential singularity + or a branch point, or the functions is non-holomorphic. + """ + ss = cls._singularities + if ss in (True, None, False): + return ss + + return fuzzy_or(a.is_infinite if s is S.ComplexInfinity + else (a - s).is_zero for s in ss) + + def _eval_aseries(self, n, args0, x, logx): + """ + Compute an asymptotic expansion around args0, in terms of self.args. + This function is only used internally by _eval_nseries and should not + be called directly; derived classes can overwrite this to implement + asymptotic expansions. + """ + raise PoleError(filldedent(''' + Asymptotic expansion of %s around %s is + not implemented.''' % (type(self), args0))) + + def _eval_nseries(self, x, n, logx, cdir=0): + """ + This function does compute series for multivariate functions, + but the expansion is always in terms of *one* variable. + + Examples + ======== + + >>> from sympy import atan2 + >>> from sympy.abc import x, y + >>> atan2(x, y).series(x, n=2) + atan2(0, y) + x/y + O(x**2) + >>> atan2(x, y).series(y, n=2) + -y/x + atan2(x, 0) + O(y**2) + + This function also computes asymptotic expansions, if necessary + and possible: + + >>> from sympy import loggamma + >>> loggamma(1/x)._eval_nseries(x,0,None) + -1/x - log(x)/x + log(x)/2 + O(1) + + """ + from .symbol import uniquely_named_symbol + from sympy.series.order import Order + from sympy.sets.sets import FiniteSet + args = self.args + args0 = [t.limit(x, 0) for t in args] + if any(t.is_finite is False for t in args0): + from .numbers import oo, zoo, nan + a = [t.as_leading_term(x, logx=logx) for t in args] + a0 = [t.limit(x, 0) for t in a] + if any(t.has(oo, -oo, zoo, nan) for t in a0): + return self._eval_aseries(n, args0, x, logx) + # Careful: the argument goes to oo, but only logarithmically so. We + # are supposed to do a power series expansion "around the + # logarithmic term". e.g. + # f(1+x+log(x)) + # -> f(1+logx) + x*f'(1+logx) + O(x**2) + # where 'logx' is given in the argument + a = [t._eval_nseries(x, n, logx) for t in args] + z = [r - r0 for (r, r0) in zip(a, a0)] + p = [Dummy() for _ in z] + q = [] + v = None + for ai, zi, pi in zip(a0, z, p): + if zi.has(x): + if v is not None: + raise NotImplementedError + q.append(ai + pi) + v = pi + else: + q.append(ai) + e1 = self.func(*q) + if v is None: + return e1 + s = e1._eval_nseries(v, n, logx) + o = s.getO() + s = s.removeO() + s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x) + return s + if (self.func.nargs is S.Naturals0 + or (self.func.nargs == FiniteSet(1) and args0[0]) + or any(c > 1 for c in self.func.nargs)): + e = self + e1 = e.expand() + if e == e1: + #for example when e = sin(x+1) or e = sin(cos(x)) + #let's try the general algorithm + if len(e.args) == 1: + # issue 14411 + e = e.func(e.args[0].cancel()) + term = e.subs(x, S.Zero) + if term.is_finite is False or term is S.NaN: + raise PoleError("Cannot expand %s around 0" % (self)) + series = term + fact = S.One + + _x = uniquely_named_symbol('xi', self) + e = e.subs(x, _x) + for i in range(1, n): + fact *= Rational(i) + e = e.diff(_x) + subs = e.subs(_x, S.Zero) + if subs is S.NaN: + # try to evaluate a limit if we have to + subs = e.limit(_x, S.Zero) + if subs.is_finite is False: + raise PoleError("Cannot expand %s around 0" % (self)) + term = subs*(x**i)/fact + term = term.expand() + series += term + return series + Order(x**n, x) + return e1.nseries(x, n=n, logx=logx) + arg = self.args[0] + l = [] + g = None + # try to predict a number of terms needed + nterms = n + 2 + cf = Order(arg.as_leading_term(x), x).getn() + if cf != 0: + nterms = (n/cf).ceiling() + for i in range(nterms): + g = self.taylor_term(i, arg, g) + g = g.nseries(x, n=n, logx=logx) + l.append(g) + return Add(*l) + Order(x**n, x) + + def fdiff(self, argindex=1): + """ + Returns the first derivative of the function. + """ + if not (1 <= argindex <= len(self.args)): + raise ArgumentIndexError(self, argindex) + ix = argindex - 1 + A = self.args[ix] + if A._diff_wrt: + if len(self.args) == 1 or not A.is_Symbol: + return _derivative_dispatch(self, A) + for i, v in enumerate(self.args): + if i != ix and A in v.free_symbols: + # it can't be in any other argument's free symbols + # issue 8510 + break + else: + return _derivative_dispatch(self, A) + + # See issue 4624 and issue 4719, 5600 and 8510 + D = Dummy('xi_%i' % argindex, dummy_index=hash(A)) + args = self.args[:ix] + (D,) + self.args[ix + 1:] + return Subs(Derivative(self.func(*args), D), D, A) + + def _eval_as_leading_term(self, x, logx, cdir): + """Stub that should be overridden by new Functions to return + the first non-zero term in a series if ever an x-dependent + argument whose leading term vanishes as x -> 0 might be encountered. + See, for example, cos._eval_as_leading_term. + """ + from sympy.series.order import Order + args = [a.as_leading_term(x, logx=logx) for a in self.args] + o = Order(1, x) + if any(x in a.free_symbols and o.contains(a) for a in args): + # Whereas x and any finite number are contained in O(1, x), + # expressions like 1/x are not. If any arg simplified to a + # vanishing expression as x -> 0 (like x or x**2, but not + # 3, 1/x, etc...) then the _eval_as_leading_term is needed + # to supply the first non-zero term of the series, + # + # e.g. expression leading term + # ---------- ------------ + # cos(1/x) cos(1/x) + # cos(cos(x)) cos(1) + # cos(x) 1 <- _eval_as_leading_term needed + # sin(x) x <- _eval_as_leading_term needed + # + raise NotImplementedError( + '%s has no _eval_as_leading_term routine' % self.func) + else: + return self + + +class DefinedFunction(Function): + """Base class for defined functions like ``sin``, ``cos``, ...""" + + @cacheit + def __new__(cls, *args, **options) -> Expr: # type: ignore + return cls._new_(*args, **options) + + +class AppliedUndef(Function): + """ + Base class for expressions resulting from the application of an undefined + function. + """ + + is_number = False + + name: str + + def __new__(cls, *args, **options) -> Expr: # type: ignore + args = tuple(map(sympify, args)) + u = [a.name for a in args if isinstance(a, UndefinedFunction)] + if u: + raise TypeError('Invalid argument: expecting an expression, not UndefinedFunction%s: %s' % ( + 's'*(len(u) > 1), ', '.join(u))) + obj: Expr = super().__new__(cls, *args, **options) # type: ignore + return obj + + def _eval_as_leading_term(self, x, logx, cdir): + return self + + @property + def _diff_wrt(self): + """ + Allow derivatives wrt to undefined functions. + + Examples + ======== + + >>> from sympy import Function, Symbol + >>> f = Function('f') + >>> x = Symbol('x') + >>> f(x)._diff_wrt + True + >>> f(x).diff(x) + Derivative(f(x), x) + """ + return True + + +class UndefSageHelper: + """ + Helper to facilitate Sage conversion. + """ + def __get__(self, ins, typ): + import sage.all as sage + if ins is None: + return lambda: sage.function(typ.__name__) + else: + args = [arg._sage_() for arg in ins.args] + return lambda : sage.function(ins.__class__.__name__)(*args) + +_undef_sage_helper = UndefSageHelper() + + +class UndefinedFunction(FunctionClass): + """ + The (meta)class of undefined functions. + """ + name: str + _sage_: UndefSageHelper + + def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, **kwargs) -> type[AppliedUndef]: + from .symbol import _filter_assumptions + # Allow Function('f', real=True) + # and/or Function(Symbol('f', real=True)) + assumptions, kwargs = _filter_assumptions(kwargs) + if isinstance(name, Symbol): + assumptions = name._merge(assumptions) + name = name.name + elif not isinstance(name, str): + raise TypeError('expecting string or Symbol for name') + else: + commutative = assumptions.get('commutative', None) + assumptions = Symbol(name, **assumptions).assumptions0 + if commutative is None: + assumptions.pop('commutative') + __dict__ = __dict__ or {} + # put the `is_*` for into __dict__ + __dict__.update({'is_%s' % k: v for k, v in assumptions.items()}) + # You can add other attributes, although they do have to be hashable + # (but seriously, if you want to add anything other than assumptions, + # just subclass Function) + __dict__.update(kwargs) + # add back the sanitized assumptions without the is_ prefix + kwargs.update(assumptions) + # Save these for __eq__ + __dict__.update({'_kwargs': kwargs}) + # do this for pickling + __dict__['__module__'] = None + obj = super().__new__(mcl, name, bases, __dict__) # type: ignore + obj.name = name + obj._sage_ = _undef_sage_helper + return obj # type: ignore + + def __instancecheck__(cls, instance): + return cls in type(instance).__mro__ + + _kwargs: dict[str, bool | None] = {} + + def __hash__(self): + return hash((self.class_key(), frozenset(self._kwargs.items()))) + + def __eq__(self, other): + return (isinstance(other, self.__class__) and + self.class_key() == other.class_key() and + self._kwargs == other._kwargs) + + def __ne__(self, other): + return not self == other + + @property + def _diff_wrt(self): + return False + + +# Using copyreg is the only way to make a dynamically generated instance of a +# metaclass picklable without using a custom pickler. It is not possible to +# define e.g. __reduce__ on the metaclass because obj.__reduce__ will retrieve +# the __reduce__ method for reducing instances of the type rather than for the +# type itself. +def _reduce_undef(f): + return (_rebuild_undef, (f.name, f._kwargs)) + +def _rebuild_undef(name, kwargs): + return Function(name, **kwargs) + +copyreg.pickle(UndefinedFunction, _reduce_undef) + + +# XXX: The type: ignore on WildFunction is because mypy complains: +# +# sympy/core/function.py:939: error: Cannot determine type of 'sort_key' in +# base class 'Expr' +# +# Somehow this is because of the @cacheit decorator but it is not clear how to +# fix it. + + +class WildFunction(Function, AtomicExpr): # type: ignore + """ + A WildFunction function matches any function (with its arguments). + + Examples + ======== + + >>> from sympy import WildFunction, Function, cos + >>> from sympy.abc import x, y + >>> F = WildFunction('F') + >>> f = Function('f') + >>> F.nargs + Naturals0 + >>> x.match(F) + >>> F.match(F) + {F_: F_} + >>> f(x).match(F) + {F_: f(x)} + >>> cos(x).match(F) + {F_: cos(x)} + >>> f(x, y).match(F) + {F_: f(x, y)} + + To match functions with a given number of arguments, set ``nargs`` to the + desired value at instantiation: + + >>> F = WildFunction('F', nargs=2) + >>> F.nargs + {2} + >>> f(x).match(F) + >>> f(x, y).match(F) + {F_: f(x, y)} + + To match functions with a range of arguments, set ``nargs`` to a tuple + containing the desired number of arguments, e.g. if ``nargs = (1, 2)`` + then functions with 1 or 2 arguments will be matched. + + >>> F = WildFunction('F', nargs=(1, 2)) + >>> F.nargs + {1, 2} + >>> f(x).match(F) + {F_: f(x)} + >>> f(x, y).match(F) + {F_: f(x, y)} + >>> f(x, y, 1).match(F) + + """ + + # XXX: What is this class attribute used for? + include: set[Any] = set() + + def __init__(cls, name, **assumptions): + from sympy.sets.sets import Set, FiniteSet + cls.name = name + nargs = assumptions.pop('nargs', S.Naturals0) + if not isinstance(nargs, Set): + # Canonicalize nargs here. See also FunctionClass. + if is_sequence(nargs): + nargs = tuple(ordered(set(nargs))) + elif nargs is not None: + nargs = (as_int(nargs),) + nargs = FiniteSet(*nargs) + cls.nargs = nargs + + def matches(self, expr, repl_dict=None, old=False): + if not isinstance(expr, (AppliedUndef, Function)): + return None + if len(expr.args) not in self.nargs: + return None + + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + repl_dict[self] = expr + return repl_dict + + +class Derivative(Expr): + """ + Carries out differentiation of the given expression with respect to symbols. + + Examples + ======== + + >>> from sympy import Derivative, Function, symbols, Subs + >>> from sympy.abc import x, y + >>> f, g = symbols('f g', cls=Function) + + >>> Derivative(x**2, x, evaluate=True) + 2*x + + Denesting of derivatives retains the ordering of variables: + + >>> Derivative(Derivative(f(x, y), y), x) + Derivative(f(x, y), y, x) + + Contiguously identical symbols are merged into a tuple giving + the symbol and the count: + + >>> Derivative(f(x), x, x, y, x) + Derivative(f(x), (x, 2), y, x) + + If the derivative cannot be performed, and evaluate is True, the + order of the variables of differentiation will be made canonical: + + >>> Derivative(f(x, y), y, x, evaluate=True) + Derivative(f(x, y), x, y) + + Derivatives with respect to undefined functions can be calculated: + + >>> Derivative(f(x)**2, f(x), evaluate=True) + 2*f(x) + + Such derivatives will show up when the chain rule is used to + evaluate a derivative: + + >>> f(g(x)).diff(x) + Derivative(f(g(x)), g(x))*Derivative(g(x), x) + + Substitution is used to represent derivatives of functions with + arguments that are not symbols or functions: + + >>> f(2*x + 3).diff(x) == 2*Subs(f(y).diff(y), y, 2*x + 3) + True + + Notes + ===== + + Simplification of high-order derivatives: + + Because there can be a significant amount of simplification that can be + done when multiple differentiations are performed, results will be + automatically simplified in a fairly conservative fashion unless the + keyword ``simplify`` is set to False. + + >>> from sympy import sqrt, diff, Function, symbols + >>> from sympy.abc import x, y, z + >>> f, g = symbols('f,g', cls=Function) + + >>> e = sqrt((x + 1)**2 + x) + >>> diff(e, (x, 5), simplify=False).count_ops() + 136 + >>> diff(e, (x, 5)).count_ops() + 30 + + Ordering of variables: + + If evaluate is set to True and the expression cannot be evaluated, the + list of differentiation symbols will be sorted, that is, the expression is + assumed to have continuous derivatives up to the order asked. + + Derivative wrt non-Symbols: + + For the most part, one may not differentiate wrt non-symbols. + For example, we do not allow differentiation wrt `x*y` because + there are multiple ways of structurally defining where x*y appears + in an expression: a very strict definition would make + (x*y*z).diff(x*y) == 0. Derivatives wrt defined functions (like + cos(x)) are not allowed, either: + + >>> (x*y*z).diff(x*y) + Traceback (most recent call last): + ... + ValueError: Can't calculate derivative wrt x*y. + + To make it easier to work with variational calculus, however, + derivatives wrt AppliedUndef and Derivatives are allowed. + For example, in the Euler-Lagrange method one may write + F(t, u, v) where u = f(t) and v = f'(t). These variables can be + written explicitly as functions of time:: + + >>> from sympy.abc import t + >>> F = Function('F') + >>> U = f(t) + >>> V = U.diff(t) + + The derivative wrt f(t) can be obtained directly: + + >>> direct = F(t, U, V).diff(U) + + When differentiation wrt a non-Symbol is attempted, the non-Symbol + is temporarily converted to a Symbol while the differentiation + is performed and the same answer is obtained: + + >>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U) + >>> assert direct == indirect + + The implication of this non-symbol replacement is that all + functions are treated as independent of other functions and the + symbols are independent of the functions that contain them:: + + >>> x.diff(f(x)) + 0 + >>> g(x).diff(f(x)) + 0 + + It also means that derivatives are assumed to depend only + on the variables of differentiation, not on anything contained + within the expression being differentiated:: + + >>> F = f(x) + >>> Fx = F.diff(x) + >>> Fx.diff(F) # derivative depends on x, not F + 0 + >>> Fxx = Fx.diff(x) + >>> Fxx.diff(Fx) # derivative depends on x, not Fx + 0 + + The last example can be made explicit by showing the replacement + of Fx in Fxx with y: + + >>> Fxx.subs(Fx, y) + Derivative(y, x) + + Since that in itself will evaluate to zero, differentiating + wrt Fx will also be zero: + + >>> _.doit() + 0 + + Replacing undefined functions with concrete expressions + + One must be careful to replace undefined functions with expressions + that contain variables consistent with the function definition and + the variables of differentiation or else insconsistent result will + be obtained. Consider the following example: + + >>> eq = f(x)*g(y) + >>> eq.subs(f(x), x*y).diff(x, y).doit() + y*Derivative(g(y), y) + g(y) + >>> eq.diff(x, y).subs(f(x), x*y).doit() + y*Derivative(g(y), y) + + The results differ because `f(x)` was replaced with an expression + that involved both variables of differentiation. In the abstract + case, differentiation of `f(x)` by `y` is 0; in the concrete case, + the presence of `y` made that derivative nonvanishing and produced + the extra `g(y)` term. + + Defining differentiation for an object + + An object must define ._eval_derivative(symbol) method that returns + the differentiation result. This function only needs to consider the + non-trivial case where expr contains symbol and it should call the diff() + method internally (not _eval_derivative); Derivative should be the only + one to call _eval_derivative. + + Any class can allow derivatives to be taken with respect to + itself (while indicating its scalar nature). See the + docstring of Expr._diff_wrt. + + See Also + ======== + _sort_variable_count + """ + + is_Derivative = True + + @property + def _diff_wrt(self): + """An expression may be differentiated wrt a Derivative if + it is in elementary form. + + Examples + ======== + + >>> from sympy import Function, Derivative, cos + >>> from sympy.abc import x + >>> f = Function('f') + + >>> Derivative(f(x), x)._diff_wrt + True + >>> Derivative(cos(x), x)._diff_wrt + False + >>> Derivative(x + 1, x)._diff_wrt + False + + A Derivative might be an unevaluated form of what will not be + a valid variable of differentiation if evaluated. For example, + + >>> Derivative(f(f(x)), x).doit() + Derivative(f(x), x)*Derivative(f(f(x)), f(x)) + + Such an expression will present the same ambiguities as arise + when dealing with any other product, like ``2*x``, so ``_diff_wrt`` + is False: + + >>> Derivative(f(f(x)), x)._diff_wrt + False + """ + return self.expr._diff_wrt and isinstance(self.doit(), Derivative) + + def __new__(cls, expr, *variables, **kwargs): + expr = sympify(expr) + if not isinstance(expr, Basic): + raise TypeError(f"Cannot represent derivative of {type(expr)}") + symbols_or_none = getattr(expr, "free_symbols", None) + has_symbol_set = isinstance(symbols_or_none, set) + + if not has_symbol_set: + raise ValueError(filldedent(''' + Since there are no variables in the expression %s, + it cannot be differentiated.''' % expr)) + + # determine value for variables if it wasn't given + if not variables: + variables = expr.free_symbols + if len(variables) != 1: + if expr.is_number: + return S.Zero + if len(variables) == 0: + raise ValueError(filldedent(''' + Since there are no variables in the expression, + the variable(s) of differentiation must be supplied + to differentiate %s''' % expr)) + else: + raise ValueError(filldedent(''' + Since there is more than one variable in the + expression, the variable(s) of differentiation + must be supplied to differentiate %s''' % expr)) + + # Split the list of variables into a list of the variables we are diff + # wrt, where each element of the list has the form (s, count) where + # s is the entity to diff wrt and count is the order of the + # derivative. + variable_count = [] + array_likes = (tuple, list, Tuple) + + from sympy.tensor.array import Array, NDimArray + + for i, v in enumerate(variables): + if isinstance(v, UndefinedFunction): + raise TypeError( + "cannot differentiate wrt " + "UndefinedFunction: %s" % v) + + if isinstance(v, array_likes): + if len(v) == 0: + # Ignore empty tuples: Derivative(expr, ... , (), ... ) + continue + if isinstance(v[0], array_likes): + # Derive by array: Derivative(expr, ... , [[x, y, z]], ... ) + if len(v) == 1: + v = Array(v[0]) + count = 1 + else: + v, count = v + v = Array(v) + else: + v, count = v + if count == 0: + continue + variable_count.append(Tuple(v, count)) + continue + + v = sympify(v) + if isinstance(v, Integer): + if i == 0: + raise ValueError("First variable cannot be a number: %i" % v) + count = v + prev, prevcount = variable_count[-1] + if prevcount != 1: + raise TypeError("tuple {} followed by number {}".format((prev, prevcount), v)) + if count == 0: + variable_count.pop() + else: + variable_count[-1] = Tuple(prev, count) + else: + count = 1 + variable_count.append(Tuple(v, count)) + + # light evaluation of contiguous, identical + # items: (x, 1), (x, 1) -> (x, 2) + merged = [] + for t in variable_count: + v, c = t + if c.is_negative: + raise ValueError( + 'order of differentiation must be nonnegative') + if merged and merged[-1][0] == v: + c += merged[-1][1] + if not c: + merged.pop() + else: + merged[-1] = Tuple(v, c) + else: + merged.append(t) + variable_count = merged + + # sanity check of variables of differentation; we waited + # until the counts were computed since some variables may + # have been removed because the count was 0 + for v, c in variable_count: + # v must have _diff_wrt True + if not v._diff_wrt: + __ = '' # filler to make error message neater + raise ValueError(filldedent(''' + Can't calculate derivative wrt %s.%s''' % (v, + __))) + + # We make a special case for 0th derivative, because there is no + # good way to unambiguously print this. + if len(variable_count) == 0: + return expr + + evaluate = kwargs.get('evaluate', False) + + if evaluate: + if isinstance(expr, Derivative): + expr = expr.canonical + variable_count = [ + (v.canonical if isinstance(v, Derivative) else v, c) + for v, c in variable_count] + + # Look for a quick exit if there are symbols that don't appear in + # expression at all. Note, this cannot check non-symbols like + # Derivatives as those can be created by intermediate + # derivatives. + zero = False + free = expr.free_symbols + from sympy.matrices.expressions.matexpr import MatrixExpr + + for v, c in variable_count: + vfree = v.free_symbols + if c.is_positive and vfree: + if isinstance(v, AppliedUndef): + # these match exactly since + # x.diff(f(x)) == g(x).diff(f(x)) == 0 + # and are not created by differentiation + D = Dummy() + if not expr.xreplace({v: D}).has(D): + zero = True + break + elif isinstance(v, MatrixExpr): + zero = False + break + elif isinstance(v, Symbol) and v not in free: + zero = True + break + else: + if not free & vfree: + # e.g. v is IndexedBase or Matrix + zero = True + break + if zero: + return cls._get_zero_with_shape_like(expr) + + # make the order of symbols canonical + #TODO: check if assumption of discontinuous derivatives exist + variable_count = cls._sort_variable_count(variable_count) + + # denest + if isinstance(expr, Derivative): + variable_count = list(expr.variable_count) + variable_count + expr = expr.expr + return _derivative_dispatch(expr, *variable_count, **kwargs) + + # we return here if evaluate is False or if there is no + # _eval_derivative method + if not evaluate or not hasattr(expr, '_eval_derivative'): + # return an unevaluated Derivative + if evaluate and variable_count == [(expr, 1)] and expr.is_scalar: + # special hack providing evaluation for classes + # that have defined is_scalar=True but have no + # _eval_derivative defined + return S.One + return Expr.__new__(cls, expr, *variable_count) + + # evaluate the derivative by calling _eval_derivative method + # of expr for each variable + # ------------------------------------------------------------- + nderivs = 0 # how many derivatives were performed + unhandled = [] + from sympy.matrices.matrixbase import MatrixBase + for i, (v, count) in enumerate(variable_count): + + old_expr = expr + old_v = None + + is_symbol = v.is_symbol or isinstance(v, + (Iterable, Tuple, MatrixBase, NDimArray)) + + if not is_symbol: + old_v = v + v = Dummy('xi') + expr = expr.xreplace({old_v: v}) + # Derivatives and UndefinedFunctions are independent + # of all others + clashing = not (isinstance(old_v, (Derivative, AppliedUndef))) + if v not in expr.free_symbols and not clashing: + return expr.diff(v) # expr's version of 0 + if not old_v.is_scalar and not hasattr( + old_v, '_eval_derivative'): + # special hack providing evaluation for classes + # that have defined is_scalar=True but have no + # _eval_derivative defined + expr *= old_v.diff(old_v) + + obj = cls._dispatch_eval_derivative_n_times(expr, v, count) + if obj is not None and obj.is_zero: + return obj + + nderivs += count + + if old_v is not None: + if obj is not None: + # remove the dummy that was used + obj = obj.subs(v, old_v) + # restore expr + expr = old_expr + + if obj is None: + # we've already checked for quick-exit conditions + # that give 0 so the remaining variables + # are contained in the expression but the expression + # did not compute a derivative so we stop taking + # derivatives + unhandled = variable_count[i:] + break + + expr = obj + + # what we have so far can be made canonical + expr = expr.replace( + lambda x: isinstance(x, Derivative), + lambda x: x.canonical) + + if unhandled: + if isinstance(expr, Derivative): + unhandled = list(expr.variable_count) + unhandled + expr = expr.expr + expr = Expr.__new__(cls, expr, *unhandled) + + if (nderivs > 1) == True and kwargs.get('simplify', True): + from .exprtools import factor_terms + from sympy.simplify.simplify import signsimp + expr = factor_terms(signsimp(expr)) + return expr + + @property + def canonical(cls): + return cls.func(cls.expr, + *Derivative._sort_variable_count(cls.variable_count)) + + @classmethod + def _sort_variable_count(cls, vc): + """ + Sort (variable, count) pairs into canonical order while + retaining order of variables that do not commute during + differentiation: + + * symbols and functions commute with each other + * derivatives commute with each other + * a derivative does not commute with anything it contains + * any other object is not allowed to commute if it has + free symbols in common with another object + + Examples + ======== + + >>> from sympy import Derivative, Function, symbols + >>> vsort = Derivative._sort_variable_count + >>> x, y, z = symbols('x y z') + >>> f, g, h = symbols('f g h', cls=Function) + + Contiguous items are collapsed into one pair: + + >>> vsort([(x, 1), (x, 1)]) + [(x, 2)] + >>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)]) + [(y, 2), (f(x), 2)] + + Ordering is canonical. + + >>> def vsort0(*v): + ... # docstring helper to + ... # change vi -> (vi, 0), sort, and return vi vals + ... return [i[0] for i in vsort([(i, 0) for i in v])] + + >>> vsort0(y, x) + [x, y] + >>> vsort0(g(y), g(x), f(y)) + [f(y), g(x), g(y)] + + Symbols are sorted as far to the left as possible but never + move to the left of a derivative having the same symbol in + its variables; the same applies to AppliedUndef which are + always sorted after Symbols: + + >>> dfx = f(x).diff(x) + >>> assert vsort0(dfx, y) == [y, dfx] + >>> assert vsort0(dfx, x) == [dfx, x] + """ + if not vc: + return [] + vc = list(vc) + if len(vc) == 1: + return [Tuple(*vc[0])] + V = list(range(len(vc))) + E = [] + v = lambda i: vc[i][0] + D = Dummy() + def _block(d, v, wrt=False): + # return True if v should not come before d else False + if d == v: + return wrt + if d.is_Symbol: + return False + if isinstance(d, Derivative): + # a derivative blocks if any of it's variables contain + # v; the wrt flag will return True for an exact match + # and will cause an AppliedUndef to block if v is in + # the arguments + if any(_block(k, v, wrt=True) + for k in d._wrt_variables): + return True + return False + if not wrt and isinstance(d, AppliedUndef): + return False + if v.is_Symbol: + return v in d.free_symbols + if isinstance(v, AppliedUndef): + return _block(d.xreplace({v: D}), D) + return d.free_symbols & v.free_symbols + for i in range(len(vc)): + for j in range(i): + if _block(v(j), v(i)): + E.append((j,i)) + # this is the default ordering to use in case of ties + O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc)))) + ix = topological_sort((V, E), key=lambda i: O[v(i)]) + # merge counts of contiguously identical items + merged = [] + for v, c in [vc[i] for i in ix]: + if merged and merged[-1][0] == v: + merged[-1][1] += c + else: + merged.append([v, c]) + return [Tuple(*i) for i in merged] + + def _eval_is_commutative(self): + return self.expr.is_commutative + + def _eval_derivative(self, v): + # If v (the variable of differentiation) is not in + # self.variables, we might be able to take the derivative. + if v not in self._wrt_variables: + dedv = self.expr.diff(v) + if isinstance(dedv, Derivative): + return dedv.func(dedv.expr, *(self.variable_count + dedv.variable_count)) + # dedv (d(self.expr)/dv) could have simplified things such that the + # derivative wrt things in self.variables can now be done. Thus, + # we set evaluate=True to see if there are any other derivatives + # that can be done. The most common case is when dedv is a simple + # number so that the derivative wrt anything else will vanish. + return self.func(dedv, *self.variables, evaluate=True) + # In this case v was in self.variables so the derivative wrt v has + # already been attempted and was not computed, either because it + # couldn't be or evaluate=False originally. + variable_count = list(self.variable_count) + variable_count.append((v, 1)) + return self.func(self.expr, *variable_count, evaluate=False) + + def doit(self, **hints): + expr = self.expr + if hints.get('deep', True): + expr = expr.doit(**hints) + hints['evaluate'] = True + rv = self.func(expr, *self.variable_count, **hints) + if rv!= self and rv.has(Derivative): + rv = rv.doit(**hints) + return rv + + @_sympifyit('z0', NotImplementedError) + def doit_numerically(self, z0): + """ + Evaluate the derivative at z numerically. + + When we can represent derivatives at a point, this should be folded + into the normal evalf. For now, we need a special method. + """ + if len(self.free_symbols) != 1 or len(self.variables) != 1: + raise NotImplementedError('partials and higher order derivatives') + z = list(self.free_symbols)[0] + + def eval(x): + f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec)) + f0 = f0.evalf(prec_to_dps(mpmath.mp.prec)) + return f0._to_mpmath(mpmath.mp.prec) + return Expr._from_mpmath(mpmath.diff(eval, + z0._to_mpmath(mpmath.mp.prec)), + mpmath.mp.prec) + + @property + def expr(self): + return self._args[0] + + @property + def _wrt_variables(self): + # return the variables of differentiation without + # respect to the type of count (int or symbolic) + return [i[0] for i in self.variable_count] + + @property + def variables(self): + # TODO: deprecate? YES, make this 'enumerated_variables' and + # name _wrt_variables as variables + # TODO: support for `d^n`? + rv = [] + for v, count in self.variable_count: + if not count.is_Integer: + raise TypeError(filldedent(''' + Cannot give expansion for symbolic count. If you just + want a list of all variables of differentiation, use + _wrt_variables.''')) + rv.extend([v]*count) + return tuple(rv) + + @property + def variable_count(self): + return self._args[1:] + + @property + def derivative_count(self): + return sum([count for _, count in self.variable_count], 0) + + @property + def free_symbols(self): + ret = self.expr.free_symbols + # Add symbolic counts to free_symbols + for _, count in self.variable_count: + ret.update(count.free_symbols) + return ret + + @property + def kind(self): + return self.args[0].kind + + def _eval_subs(self, old, new): + # The substitution (old, new) cannot be done inside + # Derivative(expr, vars) for a variety of reasons + # as handled below. + if old in self._wrt_variables: + # first handle the counts + expr = self.func(self.expr, *[(v, c.subs(old, new)) + for v, c in self.variable_count]) + if expr != self: + return expr._eval_subs(old, new) + # quick exit case + if not getattr(new, '_diff_wrt', False): + # case (0): new is not a valid variable of + # differentiation + if isinstance(old, Symbol): + # don't introduce a new symbol if the old will do + return Subs(self, old, new) + else: + xi = Dummy('xi') + return Subs(self.xreplace({old: xi}), xi, new) + + # If both are Derivatives with the same expr, check if old is + # equivalent to self or if old is a subderivative of self. + if old.is_Derivative and old.expr == self.expr: + if self.canonical == old.canonical: + return new + + # collections.Counter doesn't have __le__ + def _subset(a, b): + return all((a[i] <= b[i]) == True for i in a) + + old_vars = Counter(dict(reversed(old.variable_count))) + self_vars = Counter(dict(reversed(self.variable_count))) + if _subset(old_vars, self_vars): + return _derivative_dispatch(new, *(self_vars - old_vars).items()).canonical + + args = list(self.args) + newargs = [x._subs(old, new) for x in args] + if args[0] == old: + # complete replacement of self.expr + # we already checked that the new is valid so we know + # it won't be a problem should it appear in variables + return _derivative_dispatch(*newargs) + + if newargs[0] != args[0]: + # case (1) can't change expr by introducing something that is in + # the _wrt_variables if it was already in the expr + # e.g. + # for Derivative(f(x, g(y)), y), x cannot be replaced with + # anything that has y in it; for f(g(x), g(y)).diff(g(y)) + # g(x) cannot be replaced with anything that has g(y) + syms = {vi: Dummy() for vi in self._wrt_variables + if not vi.is_Symbol} + wrt = {syms.get(vi, vi) for vi in self._wrt_variables} + forbidden = args[0].xreplace(syms).free_symbols & wrt + nfree = new.xreplace(syms).free_symbols + ofree = old.xreplace(syms).free_symbols + if (nfree - ofree) & forbidden: + return Subs(self, old, new) + + viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:])) + if any(i != j for i, j in viter): # a wrt-variable change + # case (2) can't change vars by introducing a variable + # that is contained in expr, e.g. + # for Derivative(f(z, g(h(x), y)), y), y cannot be changed to + # x, h(x), or g(h(x), y) + for a in _atomic(self.expr, recursive=True): + for i in range(1, len(newargs)): + vi, _ = newargs[i] + if a == vi and vi != args[i][0]: + return Subs(self, old, new) + # more arg-wise checks + vc = newargs[1:] + oldv = self._wrt_variables + newe = self.expr + subs = [] + for i, (vi, ci) in enumerate(vc): + if not vi._diff_wrt: + # case (3) invalid differentiation expression so + # create a replacement dummy + xi = Dummy('xi_%i' % i) + # replace the old valid variable with the dummy + # in the expression + newe = newe.xreplace({oldv[i]: xi}) + # and replace the bad variable with the dummy + vc[i] = (xi, ci) + # and record the dummy with the new (invalid) + # differentiation expression + subs.append((xi, vi)) + + if subs: + # handle any residual substitution in the expression + newe = newe._subs(old, new) + # return the Subs-wrapped derivative + return Subs(Derivative(newe, *vc), *zip(*subs)) + + # everything was ok + return _derivative_dispatch(*newargs) + + def _eval_lseries(self, x, logx, cdir=0): + dx = self.variables + for term in self.expr.lseries(x, logx=logx, cdir=cdir): + yield self.func(term, *dx) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.expr.nseries(x, n=n, logx=logx) + o = arg.getO() + dx = self.variables + rv = [self.func(a, *dx) for a in Add.make_args(arg.removeO())] + if o: + rv.append(o/x) + return Add(*rv) + + def _eval_as_leading_term(self, x, logx, cdir): + series_gen = self.expr.lseries(x) + d = S.Zero + for leading_term in series_gen: + d = diff(leading_term, *self.variables) + if d != 0: + break + return d + + def as_finite_difference(self, points=1, x0=None, wrt=None): + """ Expresses a Derivative instance as a finite difference. + + Parameters + ========== + + points : sequence or coefficient, optional + If sequence: discrete values (length >= order+1) of the + independent variable used for generating the finite + difference weights. + If it is a coefficient, it will be used as the step-size + for generating an equidistant sequence of length order+1 + centered around ``x0``. Default: 1 (step-size 1) + + x0 : number or Symbol, optional + the value of the independent variable (``wrt``) at which the + derivative is to be approximated. Default: same as ``wrt``. + + wrt : Symbol, optional + "with respect to" the variable for which the (partial) + derivative is to be approximated for. If not provided it + is required that the derivative is ordinary. Default: ``None``. + + + Examples + ======== + + >>> from sympy import symbols, Function, exp, sqrt, Symbol + >>> x, h = symbols('x h') + >>> f = Function('f') + >>> f(x).diff(x).as_finite_difference() + -f(x - 1/2) + f(x + 1/2) + + The default step size and number of points are 1 and + ``order + 1`` respectively. We can change the step size by + passing a symbol as a parameter: + + >>> f(x).diff(x).as_finite_difference(h) + -f(-h/2 + x)/h + f(h/2 + x)/h + + We can also specify the discretized values to be used in a + sequence: + + >>> f(x).diff(x).as_finite_difference([x, x+h, x+2*h]) + -3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h) + + The algorithm is not restricted to use equidistant spacing, nor + do we need to make the approximation around ``x0``, but we can get + an expression estimating the derivative at an offset: + + >>> e, sq2 = exp(1), sqrt(2) + >>> xl = [x-h, x+h, x+e*h] + >>> f(x).diff(x, 1).as_finite_difference(xl, x+h*sq2) # doctest: +ELLIPSIS + 2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/... + + To approximate ``Derivative`` around ``x0`` using a non-equidistant + spacing step, the algorithm supports assignment of undefined + functions to ``points``: + + >>> dx = Function('dx') + >>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h) + -f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x) + + Partial derivatives are also supported: + + >>> y = Symbol('y') + >>> d2fdxdy=f(x,y).diff(x,y) + >>> d2fdxdy.as_finite_difference(wrt=x) + -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) + + We can apply ``as_finite_difference`` to ``Derivative`` instances in + compound expressions using ``replace``: + + >>> (1 + 42**f(x).diff(x)).replace(lambda arg: arg.is_Derivative, + ... lambda arg: arg.as_finite_difference()) + 42**(-f(x - 1/2) + f(x + 1/2)) + 1 + + + See also + ======== + + sympy.calculus.finite_diff.apply_finite_diff + sympy.calculus.finite_diff.differentiate_finite + sympy.calculus.finite_diff.finite_diff_weights + + """ + from sympy.calculus.finite_diff import _as_finite_diff + return _as_finite_diff(self, points, x0, wrt) + + @classmethod + def _get_zero_with_shape_like(cls, expr): + return S.Zero + + @classmethod + def _dispatch_eval_derivative_n_times(cls, expr, v, count): + # Evaluate the derivative `n` times. If + # `_eval_derivative_n_times` is not overridden by the current + # object, the default in `Basic` will call a loop over + # `_eval_derivative`: + return expr._eval_derivative_n_times(v, count) + + +def _derivative_dispatch(expr, *variables, **kwargs): + from sympy.matrices.matrixbase import MatrixBase + from sympy.matrices.expressions.matexpr import MatrixExpr + from sympy.tensor.array import NDimArray + array_types = (MatrixBase, MatrixExpr, NDimArray, list, tuple, Tuple) + if isinstance(expr, array_types) or any(isinstance(i[0], array_types) if isinstance(i, (tuple, list, Tuple)) else isinstance(i, array_types) for i in variables): + from sympy.tensor.array.array_derivatives import ArrayDerivative + return ArrayDerivative(expr, *variables, **kwargs) + return Derivative(expr, *variables, **kwargs) + + +class Lambda(Expr): + """ + Lambda(x, expr) represents a lambda function similar to Python's + 'lambda x: expr'. A function of several variables is written as + Lambda((x, y, ...), expr). + + Examples + ======== + + A simple example: + + >>> from sympy import Lambda + >>> from sympy.abc import x + >>> f = Lambda(x, x**2) + >>> f(4) + 16 + + For multivariate functions, use: + + >>> from sympy.abc import y, z, t + >>> f2 = Lambda((x, y, z, t), x + y**z + t**z) + >>> f2(1, 2, 3, 4) + 73 + + It is also possible to unpack tuple arguments: + + >>> f = Lambda(((x, y), z), x + y + z) + >>> f((1, 2), 3) + 6 + + A handy shortcut for lots of arguments: + + >>> p = x, y, z + >>> f = Lambda(p, x + y*z) + >>> f(*p) + x + y*z + + """ + is_Function = True + + def __new__(cls, signature, expr) -> Lambda: + if iterable(signature) and not isinstance(signature, (tuple, Tuple)): + sympy_deprecation_warning( + """ + Using a non-tuple iterable as the first argument to Lambda + is deprecated. Use Lambda(tuple(args), expr) instead. + """, + deprecated_since_version="1.5", + active_deprecations_target="deprecated-non-tuple-lambda", + ) + signature = tuple(signature) + _sig = signature if iterable(signature) else (signature,) + sig: Tuple = sympify(_sig) # type: ignore + cls._check_signature(sig) + + if len(sig) == 1 and sig[0] == expr: + return S.IdentityFunction + + return Expr.__new__(cls, sig, sympify(expr)) + + @classmethod + def _check_signature(cls, sig): + syms = set() + + def rcheck(args): + for a in args: + if a.is_symbol: + if a in syms: + raise BadSignatureError("Duplicate symbol %s" % a) + syms.add(a) + elif isinstance(a, Tuple): + rcheck(a) + else: + raise BadSignatureError("Lambda signature should be only tuples" + " and symbols, not %s" % a) + + if not isinstance(sig, Tuple): + raise BadSignatureError("Lambda signature should be a tuple not %s" % sig) + # Recurse through the signature: + rcheck(sig) + + @property + def signature(self): + """The expected form of the arguments to be unpacked into variables""" + return self._args[0] + + @property + def expr(self): + """The return value of the function""" + return self._args[1] + + @property + def variables(self): + """The variables used in the internal representation of the function""" + def _variables(args): + if isinstance(args, Tuple): + for arg in args: + yield from _variables(arg) + else: + yield args + return tuple(_variables(self.signature)) + + @property + def nargs(self): + from sympy.sets.sets import FiniteSet + return FiniteSet(len(self.signature)) + + bound_symbols = variables + + @property + def free_symbols(self): + return self.expr.free_symbols - set(self.variables) + + def __call__(self, *args): + n = len(args) + if n not in self.nargs: # Lambda only ever has 1 value in nargs + # XXX: exception message must be in exactly this format to + # make it work with NumPy's functions like vectorize(). See, + # for example, https://github.com/numpy/numpy/issues/1697. + # The ideal solution would be just to attach metadata to + # the exception and change NumPy to take advantage of this. + ## XXX does this apply to Lambda? If not, remove this comment. + temp = ('%(name)s takes exactly %(args)s ' + 'argument%(plural)s (%(given)s given)') + raise BadArgumentsError(temp % { + 'name': self, + 'args': list(self.nargs)[0], + 'plural': 's'*(list(self.nargs)[0] != 1), + 'given': n}) + + d = self._match_signature(self.signature, args) + + return self.expr.xreplace(d) + + def _match_signature(self, sig, args): + + symargmap = {} + + def rmatch(pars, args): + for par, arg in zip(pars, args): + if par.is_symbol: + symargmap[par] = arg + elif isinstance(par, Tuple): + if not isinstance(arg, (tuple, Tuple)) or len(args) != len(pars): + raise BadArgumentsError("Can't match %s and %s" % (args, pars)) + rmatch(par, arg) + + rmatch(sig, args) + + return symargmap + + @property + def is_identity(self): + """Return ``True`` if this ``Lambda`` is an identity function. """ + return self.signature == self.expr + + def _eval_evalf(self, prec): + return self.func(self.args[0], self.args[1].evalf(n=prec_to_dps(prec))) + + +class Subs(Expr): + """ + Represents unevaluated substitutions of an expression. + + ``Subs(expr, x, x0)`` represents the expression resulting + from substituting x with x0 in expr. + + Parameters + ========== + + expr : Expr + An expression. + + x : tuple, variable + A variable or list of distinct variables. + + x0 : tuple or list of tuples + A point or list of evaluation points + corresponding to those variables. + + Examples + ======== + + >>> from sympy import Subs, Function, sin, cos + >>> from sympy.abc import x, y, z + >>> f = Function('f') + + Subs are created when a particular substitution cannot be made. The + x in the derivative cannot be replaced with 0 because 0 is not a + valid variables of differentiation: + + >>> f(x).diff(x).subs(x, 0) + Subs(Derivative(f(x), x), x, 0) + + Once f is known, the derivative and evaluation at 0 can be done: + + >>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0) + True + + Subs can also be created directly with one or more variables: + + >>> Subs(f(x)*sin(y) + z, (x, y), (0, 1)) + Subs(z + f(x)*sin(y), (x, y), (0, 1)) + >>> _.doit() + z + f(0)*sin(1) + + Notes + ===== + + ``Subs`` objects are generally useful to represent unevaluated derivatives + calculated at a point. + + The variables may be expressions, but they are subjected to the limitations + of subs(), so it is usually a good practice to use only symbols for + variables, since in that case there can be no ambiguity. + + There's no automatic expansion - use the method .doit() to effect all + possible substitutions of the object and also of objects inside the + expression. + + When evaluating derivatives at a point that is not a symbol, a Subs object + is returned. One is also able to calculate derivatives of Subs objects - in + this case the expression is always expanded (for the unevaluated form, use + Derivative()). + + In order to allow expressions to combine before doit is done, a + representation of the Subs expression is used internally to make + expressions that are superficially different compare the same: + + >>> a, b = Subs(x, x, 0), Subs(y, y, 0) + >>> a + b + 2*Subs(x, x, 0) + + This can lead to unexpected consequences when using methods + like `has` that are cached: + + >>> s = Subs(x, x, 0) + >>> s.has(x), s.has(y) + (True, False) + >>> ss = s.subs(x, y) + >>> ss.has(x), ss.has(y) + (True, False) + >>> s, ss + (Subs(x, x, 0), Subs(y, y, 0)) + """ + def __new__(cls, expr, variables, point, **assumptions): + if not is_sequence(variables, Tuple): + variables = [variables] + variables = Tuple(*variables) + + if has_dups(variables): + repeated = [str(v) for v, i in Counter(variables).items() if i > 1] + __ = ', '.join(repeated) + raise ValueError(filldedent(''' + The following expressions appear more than once: %s + ''' % __)) + + point = Tuple(*(point if is_sequence(point, Tuple) else [point])) + + if len(point) != len(variables): + raise ValueError('Number of point values must be the same as ' + 'the number of variables.') + + if not point: + return sympify(expr) + + # denest + if isinstance(expr, Subs): + variables = expr.variables + variables + point = expr.point + point + expr = expr.expr + else: + expr = sympify(expr) + + # use symbols with names equal to the point value (with prepended _) + # to give a variable-independent expression + pre = "_" + pts = sorted(set(point), key=default_sort_key) + from sympy.printing.str import StrPrinter + class CustomStrPrinter(StrPrinter): + def _print_Dummy(self, expr): + return str(expr) + str(expr.dummy_index) + def mystr(expr, **settings): + p = CustomStrPrinter(settings) + return p.doprint(expr) + while 1: + s_pts = {p: Symbol(pre + mystr(p)) for p in pts} + reps = [(v, s_pts[p]) + for v, p in zip(variables, point)] + # if any underscore-prepended symbol is already a free symbol + # and is a variable with a different point value, then there + # is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0)) + # because the new symbol that would be created is _1 but _1 + # is already mapped to 0 so __0 and __1 are used for the new + # symbols + if any(r in expr.free_symbols and + r in variables and + Symbol(pre + mystr(point[variables.index(r)])) != r + for _, r in reps): + pre += "_" + continue + break + + obj = Expr.__new__(cls, expr, Tuple(*variables), point) + obj._expr = expr.xreplace(dict(reps)) + return obj + + def _eval_is_commutative(self): + return self.expr.is_commutative + + def doit(self, **hints): + e, v, p = self.args + + # remove self mappings + for i, (vi, pi) in enumerate(zip(v, p)): + if vi == pi: + v = v[:i] + v[i + 1:] + p = p[:i] + p[i + 1:] + if not v: + return self.expr + + if isinstance(e, Derivative): + # apply functions first, e.g. f -> cos + undone = [] + for i, vi in enumerate(v): + if isinstance(vi, FunctionClass): + e = e.subs(vi, p[i]) + else: + undone.append((vi, p[i])) + if not isinstance(e, Derivative): + e = e.doit() + if isinstance(e, Derivative): + # do Subs that aren't related to differentiation + undone2 = [] + D = Dummy() + arg = e.args[0] + for vi, pi in undone: + if D not in e.xreplace({vi: D}).free_symbols: + if arg.has(vi): + e = e.subs(vi, pi) + else: + undone2.append((vi, pi)) + undone = undone2 + # differentiate wrt variables that are present + wrt = [] + D = Dummy() + expr = e.expr + free = expr.free_symbols + for vi, ci in e.variable_count: + if isinstance(vi, Symbol) and vi in free: + expr = expr.diff((vi, ci)) + elif D in expr.subs(vi, D).free_symbols: + expr = expr.diff((vi, ci)) + else: + wrt.append((vi, ci)) + # inject remaining subs + rv = expr.subs(undone) + # do remaining differentiation *in order given* + for vc in wrt: + rv = rv.diff(vc) + else: + # inject remaining subs + rv = e.subs(undone) + else: + rv = e.doit(**hints).subs(list(zip(v, p))) + + if hints.get('deep', True) and rv != self: + rv = rv.doit(**hints) + return rv + + def evalf(self, prec=None, **options): + return self.doit().evalf(prec, **options) + + n = evalf # type:ignore + + @property + def variables(self): + """The variables to be evaluated""" + return self._args[1] + + bound_symbols = variables + + @property + def expr(self): + """The expression on which the substitution operates""" + return self._args[0] + + @property + def point(self): + """The values for which the variables are to be substituted""" + return self._args[2] + + @property + def free_symbols(self): + return (self.expr.free_symbols - set(self.variables) | + set(self.point.free_symbols)) + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + # Don't show the warning twice from the recursive call + with ignore_warnings(SymPyDeprecationWarning): + return (self.expr.expr_free_symbols - set(self.variables) | + set(self.point.expr_free_symbols)) + + def __eq__(self, other): + if not isinstance(other, Subs): + return False + return self._hashable_content() == other._hashable_content() + + def __ne__(self, other): + return not(self == other) + + def __hash__(self): + return super().__hash__() + + def _hashable_content(self): + return (self._expr.xreplace(self.canonical_variables), + ) + tuple(ordered([(v, p) for v, p in + zip(self.variables, self.point) if not self.expr.has(v)])) + + def _eval_subs(self, old, new): + # Subs doit will do the variables in order; the semantics + # of subs for Subs is have the following invariant for + # Subs object foo: + # foo.doit().subs(reps) == foo.subs(reps).doit() + pt = list(self.point) + if old in self.variables: + if _atomic(new) == {new} and not any( + i.has(new) for i in self.args): + # the substitution is neutral + return self.xreplace({old: new}) + # any occurrence of old before this point will get + # handled by replacements from here on + i = self.variables.index(old) + for j in range(i, len(self.variables)): + pt[j] = pt[j]._subs(old, new) + return self.func(self.expr, self.variables, pt) + v = [i._subs(old, new) for i in self.variables] + if v != list(self.variables): + return self.func(self.expr, self.variables + (old,), pt + [new]) + expr = self.expr._subs(old, new) + pt = [i._subs(old, new) for i in self.point] + return self.func(expr, v, pt) + + def _eval_derivative(self, s): + # Apply the chain rule of the derivative on the substitution variables: + f = self.expr + vp = V, P = self.variables, self.point + val = Add.fromiter(p.diff(s)*Subs(f.diff(v), *vp).doit() + for v, p in zip(V, P)) + + # these are all the free symbols in the expr + efree = f.free_symbols + # some symbols like IndexedBase include themselves and args + # as free symbols + compound = {i for i in efree if len(i.free_symbols) > 1} + # hide them and see what independent free symbols remain + dums = {Dummy() for i in compound} + masked = f.xreplace(dict(zip(compound, dums))) + ifree = masked.free_symbols - dums + # include the compound symbols + free = ifree | compound + # remove the variables already handled + free -= set(V) + # add back any free symbols of remaining compound symbols + free |= {i for j in free & compound for i in j.free_symbols} + # if symbols of s are in free then there is more to do + if free & s.free_symbols: + val += Subs(f.diff(s), self.variables, self.point).doit() + return val + + def _eval_nseries(self, x, n, logx, cdir=0): + if x in self.point: + # x is the variable being substituted into + apos = self.point.index(x) + other = self.variables[apos] + else: + other = x + arg = self.expr.nseries(other, n=n, logx=logx) + o = arg.getO() + terms = Add.make_args(arg.removeO()) + rv = Add(*[self.func(a, *self.args[1:]) for a in terms]) + if o: + rv += o.subs(other, x) + return rv + + def _eval_as_leading_term(self, x, logx, cdir): + if x in self.point: + ipos = self.point.index(x) + xvar = self.variables[ipos] + return self.expr.as_leading_term(xvar) + if x in self.variables: + # if `x` is a dummy variable, it means it won't exist after the + # substitution has been performed: + return self + # The variable is independent of the substitution: + return self.expr.as_leading_term(x) + + +def diff(f, *symbols, **kwargs): + """ + Differentiate f with respect to symbols. + + Explanation + =========== + + This is just a wrapper to unify .diff() and the Derivative class; its + interface is similar to that of integrate(). You can use the same + shortcuts for multiple variables as with Derivative. For example, + diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative + of f(x). + + You can pass evaluate=False to get an unevaluated Derivative class. Note + that if there are 0 symbols (such as diff(f(x), x, 0), then the result will + be the function (the zeroth derivative), even if evaluate=False. + + Examples + ======== + + >>> from sympy import sin, cos, Function, diff + >>> from sympy.abc import x, y + >>> f = Function('f') + + >>> diff(sin(x), x) + cos(x) + >>> diff(f(x), x, x, x) + Derivative(f(x), (x, 3)) + >>> diff(f(x), x, 3) + Derivative(f(x), (x, 3)) + >>> diff(sin(x)*cos(y), x, 2, y, 2) + sin(x)*cos(y) + + >>> type(diff(sin(x), x)) + cos + >>> type(diff(sin(x), x, evaluate=False)) + + >>> type(diff(sin(x), x, 0)) + sin + >>> type(diff(sin(x), x, 0, evaluate=False)) + sin + + >>> diff(sin(x)) + cos(x) + >>> diff(sin(x*y)) + Traceback (most recent call last): + ... + ValueError: specify differentiation variables to differentiate sin(x*y) + + Note that ``diff(sin(x))`` syntax is meant only for convenience + in interactive sessions and should be avoided in library code. + + References + ========== + + .. [1] https://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html + + See Also + ======== + + Derivative + idiff: computes the derivative implicitly + + """ + if hasattr(f, 'diff'): + return f.diff(*symbols, **kwargs) + kwargs.setdefault('evaluate', True) + return _derivative_dispatch(f, *symbols, **kwargs) + + +def expand(e, deep=True, modulus=None, power_base=True, power_exp=True, + mul=True, log=True, multinomial=True, basic=True, **hints): + r""" + Expand an expression using methods given as hints. + + Explanation + =========== + + Hints evaluated unless explicitly set to False are: ``basic``, ``log``, + ``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following + hints are supported but not applied unless set to True: ``complex``, + ``func``, and ``trig``. In addition, the following meta-hints are + supported by some or all of the other hints: ``frac``, ``numer``, + ``denom``, ``modulus``, and ``force``. ``deep`` is supported by all + hints. Additionally, subclasses of Expr may define their own hints or + meta-hints. + + The ``basic`` hint is used for any special rewriting of an object that + should be done automatically (along with the other hints like ``mul``) + when expand is called. This is a catch-all hint to handle any sort of + expansion that may not be described by the existing hint names. To use + this hint an object should override the ``_eval_expand_basic`` method. + Objects may also define their own expand methods, which are not run by + default. See the API section below. + + If ``deep`` is set to ``True`` (the default), things like arguments of + functions are recursively expanded. Use ``deep=False`` to only expand on + the top level. + + If the ``force`` hint is used, assumptions about variables will be ignored + in making the expansion. + + Hints + ===== + + These hints are run by default + + mul + --- + + Distributes multiplication over addition: + + >>> from sympy import cos, exp, sin + >>> from sympy.abc import x, y, z + >>> (y*(x + z)).expand(mul=True) + x*y + y*z + + multinomial + ----------- + + Expand (x + y + ...)**n where n is a positive integer. + + >>> ((x + y + z)**2).expand(multinomial=True) + x**2 + 2*x*y + 2*x*z + y**2 + 2*y*z + z**2 + + power_exp + --------- + + Expand addition in exponents into multiplied bases. + + >>> exp(x + y).expand(power_exp=True) + exp(x)*exp(y) + >>> (2**(x + y)).expand(power_exp=True) + 2**x*2**y + + power_base + ---------- + + Split powers of multiplied bases. + + This only happens by default if assumptions allow, or if the + ``force`` meta-hint is used: + + >>> ((x*y)**z).expand(power_base=True) + (x*y)**z + >>> ((x*y)**z).expand(power_base=True, force=True) + x**z*y**z + >>> ((2*y)**z).expand(power_base=True) + 2**z*y**z + + Note that in some cases where this expansion always holds, SymPy performs + it automatically: + + >>> (x*y)**2 + x**2*y**2 + + log + --- + + Pull out power of an argument as a coefficient and split logs products + into sums of logs. + + Note that these only work if the arguments of the log function have the + proper assumptions--the arguments must be positive and the exponents must + be real--or else the ``force`` hint must be True: + + >>> from sympy import log, symbols + >>> log(x**2*y).expand(log=True) + log(x**2*y) + >>> log(x**2*y).expand(log=True, force=True) + 2*log(x) + log(y) + >>> x, y = symbols('x,y', positive=True) + >>> log(x**2*y).expand(log=True) + 2*log(x) + log(y) + + basic + ----- + + This hint is intended primarily as a way for custom subclasses to enable + expansion by default. + + These hints are not run by default: + + complex + ------- + + Split an expression into real and imaginary parts. + + >>> x, y = symbols('x,y') + >>> (x + y).expand(complex=True) + re(x) + re(y) + I*im(x) + I*im(y) + >>> cos(x).expand(complex=True) + -I*sin(re(x))*sinh(im(x)) + cos(re(x))*cosh(im(x)) + + Note that this is just a wrapper around ``as_real_imag()``. Most objects + that wish to redefine ``_eval_expand_complex()`` should consider + redefining ``as_real_imag()`` instead. + + func + ---- + + Expand other functions. + + >>> from sympy import gamma + >>> gamma(x + 1).expand(func=True) + x*gamma(x) + + trig + ---- + + Do trigonometric expansions. + + >>> cos(x + y).expand(trig=True) + -sin(x)*sin(y) + cos(x)*cos(y) + >>> sin(2*x).expand(trig=True) + 2*sin(x)*cos(x) + + Note that the forms of ``sin(n*x)`` and ``cos(n*x)`` in terms of ``sin(x)`` + and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x) + = 1`. The current implementation uses the form obtained from Chebyshev + polynomials, but this may change. See `this MathWorld article + `_ for more + information. + + Notes + ===== + + - You can shut off unwanted methods:: + + >>> (exp(x + y)*(x + y)).expand() + x*exp(x)*exp(y) + y*exp(x)*exp(y) + >>> (exp(x + y)*(x + y)).expand(power_exp=False) + x*exp(x + y) + y*exp(x + y) + >>> (exp(x + y)*(x + y)).expand(mul=False) + (x + y)*exp(x)*exp(y) + + - Use deep=False to only expand on the top level:: + + >>> exp(x + exp(x + y)).expand() + exp(x)*exp(exp(x)*exp(y)) + >>> exp(x + exp(x + y)).expand(deep=False) + exp(x)*exp(exp(x + y)) + + - Hints are applied in an arbitrary, but consistent order (in the current + implementation, they are applied in alphabetical order, except + multinomial comes before mul, but this may change). Because of this, + some hints may prevent expansion by other hints if they are applied + first. For example, ``mul`` may distribute multiplications and prevent + ``log`` and ``power_base`` from expanding them. Also, if ``mul`` is + applied before ``multinomial`, the expression might not be fully + distributed. The solution is to use the various ``expand_hint`` helper + functions or to use ``hint=False`` to this function to finely control + which hints are applied. Here are some examples:: + + >>> from sympy import expand, expand_mul, expand_power_base + >>> x, y, z = symbols('x,y,z', positive=True) + + >>> expand(log(x*(y + z))) + log(x) + log(y + z) + + Here, we see that ``log`` was applied before ``mul``. To get the mul + expanded form, either of the following will work:: + + >>> expand_mul(log(x*(y + z))) + log(x*y + x*z) + >>> expand(log(x*(y + z)), log=False) + log(x*y + x*z) + + A similar thing can happen with the ``power_base`` hint:: + + >>> expand((x*(y + z))**x) + (x*y + x*z)**x + + To get the ``power_base`` expanded form, either of the following will + work:: + + >>> expand((x*(y + z))**x, mul=False) + x**x*(y + z)**x + >>> expand_power_base((x*(y + z))**x) + x**x*(y + z)**x + + >>> expand((x + y)*y/x) + y + y**2/x + + The parts of a rational expression can be targeted:: + + >>> expand((x + y)*y/x/(x + 1), frac=True) + (x*y + y**2)/(x**2 + x) + >>> expand((x + y)*y/x/(x + 1), numer=True) + (x*y + y**2)/(x*(x + 1)) + >>> expand((x + y)*y/x/(x + 1), denom=True) + y*(x + y)/(x**2 + x) + + - The ``modulus`` meta-hint can be used to reduce the coefficients of an + expression post-expansion:: + + >>> expand((3*x + 1)**2) + 9*x**2 + 6*x + 1 + >>> expand((3*x + 1)**2, modulus=5) + 4*x**2 + x + 1 + + - Either ``expand()`` the function or ``.expand()`` the method can be + used. Both are equivalent:: + + >>> expand((x + 1)**2) + x**2 + 2*x + 1 + >>> ((x + 1)**2).expand() + x**2 + 2*x + 1 + + API + === + + Objects can define their own expand hints by defining + ``_eval_expand_hint()``. The function should take the form:: + + def _eval_expand_hint(self, **hints): + # Only apply the method to the top-level expression + ... + + See also the example below. Objects should define ``_eval_expand_hint()`` + methods only if ``hint`` applies to that specific object. The generic + ``_eval_expand_hint()`` method defined in Expr will handle the no-op case. + + Each hint should be responsible for expanding that hint only. + Furthermore, the expansion should be applied to the top-level expression + only. ``expand()`` takes care of the recursion that happens when + ``deep=True``. + + You should only call ``_eval_expand_hint()`` methods directly if you are + 100% sure that the object has the method, as otherwise you are liable to + get unexpected ``AttributeError``s. Note, again, that you do not need to + recursively apply the hint to args of your object: this is handled + automatically by ``expand()``. ``_eval_expand_hint()`` should + generally not be used at all outside of an ``_eval_expand_hint()`` method. + If you want to apply a specific expansion from within another method, use + the public ``expand()`` function, method, or ``expand_hint()`` functions. + + In order for expand to work, objects must be rebuildable by their args, + i.e., ``obj.func(*obj.args) == obj`` must hold. + + Expand methods are passed ``**hints`` so that expand hints may use + 'metahints'--hints that control how different expand methods are applied. + For example, the ``force=True`` hint described above that causes + ``expand(log=True)`` to ignore assumptions is such a metahint. The + ``deep`` meta-hint is handled exclusively by ``expand()`` and is not + passed to ``_eval_expand_hint()`` methods. + + Note that expansion hints should generally be methods that perform some + kind of 'expansion'. For hints that simply rewrite an expression, use the + .rewrite() API. + + Examples + ======== + + >>> from sympy import Expr, sympify + >>> class MyClass(Expr): + ... def __new__(cls, *args): + ... args = sympify(args) + ... return Expr.__new__(cls, *args) + ... + ... def _eval_expand_double(self, *, force=False, **hints): + ... ''' + ... Doubles the args of MyClass. + ... + ... If there more than four args, doubling is not performed, + ... unless force=True is also used (False by default). + ... ''' + ... if not force and len(self.args) > 4: + ... return self + ... return self.func(*(self.args + self.args)) + ... + >>> a = MyClass(1, 2, MyClass(3, 4)) + >>> a + MyClass(1, 2, MyClass(3, 4)) + >>> a.expand(double=True) + MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4)) + >>> a.expand(double=True, deep=False) + MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4)) + + >>> b = MyClass(1, 2, 3, 4, 5) + >>> b.expand(double=True) + MyClass(1, 2, 3, 4, 5) + >>> b.expand(double=True, force=True) + MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5) + + See Also + ======== + + expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig, + expand_power_base, expand_power_exp, expand_func, sympy.simplify.hyperexpand.hyperexpand + + """ + # don't modify this; modify the Expr.expand method + hints['power_base'] = power_base + hints['power_exp'] = power_exp + hints['mul'] = mul + hints['log'] = log + hints['multinomial'] = multinomial + hints['basic'] = basic + return sympify(e).expand(deep=deep, modulus=modulus, **hints) + +# This is a special application of two hints + +def _mexpand(expr, recursive=False): + # expand multinomials and then expand products; this may not always + # be sufficient to give a fully expanded expression (see + # test_issue_8247_8354 in test_arit) + if expr is None: + return + was = None + while was != expr: + was, expr = expr, expand_mul(expand_multinomial(expr)) + if not recursive: + break + return expr + + +# These are simple wrappers around single hints. + + +def expand_mul(expr, deep=True): + """ + Wrapper around expand that only uses the mul hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_mul, exp, log + >>> x, y = symbols('x,y', positive=True) + >>> expand_mul(exp(x+y)*(x+y)*log(x*y**2)) + x*exp(x + y)*log(x*y**2) + y*exp(x + y)*log(x*y**2) + + """ + return sympify(expr).expand(deep=deep, mul=True, power_exp=False, + power_base=False, basic=False, multinomial=False, log=False) + + +def expand_multinomial(expr, deep=True): + """ + Wrapper around expand that only uses the multinomial hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_multinomial, exp + >>> x, y = symbols('x y', positive=True) + >>> expand_multinomial((x + exp(x + 1))**2) + x**2 + 2*x*exp(x + 1) + exp(2*x + 2) + + """ + return sympify(expr).expand(deep=deep, mul=False, power_exp=False, + power_base=False, basic=False, multinomial=True, log=False) + + +def expand_log(expr, deep=True, force=False, factor=False): + """ + Wrapper around expand that only uses the log hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_log, exp, log + >>> x, y = symbols('x,y', positive=True) + >>> expand_log(exp(x+y)*(x+y)*log(x*y**2)) + (x + y)*(log(x) + 2*log(y))*exp(x + y) + + """ + from sympy.functions.elementary.exponential import log + from sympy.simplify.radsimp import fraction + if factor is False: + def _handleMul(x): + # look for the simple case of expanded log(b**a)/log(b) -> a in args + n, d = fraction(x) + n = [i for i in n.atoms(log) if i.args[0].is_Integer] + d = [i for i in d.atoms(log) if i.args[0].is_Integer] + if len(n) == 1 and len(d) == 1: + n = n[0] + d = d[0] + from sympy import multiplicity + m = multiplicity(d.args[0], n.args[0]) + if m: + r = m + log(n.args[0]//d.args[0]**m)/d + x = x.subs(n, d*r) + x1 = expand_mul(expand_log(x, deep=deep, force=force, factor=True)) + if x1.count(log) <= x.count(log): + return x1 + return x + + expr = expr.replace( + lambda x: x.is_Mul and all(any(isinstance(i, log) and i.args[0].is_Rational + for i in Mul.make_args(j)) for j in x.as_numer_denom()), + _handleMul) + + return sympify(expr).expand(deep=deep, log=True, mul=False, + power_exp=False, power_base=False, multinomial=False, + basic=False, force=force, factor=factor) + + +def expand_func(expr, deep=True): + """ + Wrapper around expand that only uses the func hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_func, gamma + >>> from sympy.abc import x + >>> expand_func(gamma(x + 2)) + x*(x + 1)*gamma(x) + + """ + return sympify(expr).expand(deep=deep, func=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_trig(expr, deep=True): + """ + Wrapper around expand that only uses the trig hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_trig, sin + >>> from sympy.abc import x, y + >>> expand_trig(sin(x+y)*(x+y)) + (x + y)*(sin(x)*cos(y) + sin(y)*cos(x)) + + """ + return sympify(expr).expand(deep=deep, trig=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_complex(expr, deep=True): + """ + Wrapper around expand that only uses the complex hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_complex, exp, sqrt, I + >>> from sympy.abc import z + >>> expand_complex(exp(z)) + I*exp(re(z))*sin(im(z)) + exp(re(z))*cos(im(z)) + >>> expand_complex(sqrt(I)) + sqrt(2)/2 + sqrt(2)*I/2 + + See Also + ======== + + sympy.core.expr.Expr.as_real_imag + """ + return sympify(expr).expand(deep=deep, complex=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_power_base(expr, deep=True, force=False): + """ + Wrapper around expand that only uses the power_base hint. + + A wrapper to expand(power_base=True) which separates a power with a base + that is a Mul into a product of powers, without performing any other + expansions, provided that assumptions about the power's base and exponent + allow. + + deep=False (default is True) will only apply to the top-level expression. + + force=True (default is False) will cause the expansion to ignore + assumptions about the base and exponent. When False, the expansion will + only happen if the base is non-negative or the exponent is an integer. + + >>> from sympy.abc import x, y, z + >>> from sympy import expand_power_base, sin, cos, exp, Symbol + + >>> (x*y)**2 + x**2*y**2 + + >>> (2*x)**y + (2*x)**y + >>> expand_power_base(_) + 2**y*x**y + + >>> expand_power_base((x*y)**z) + (x*y)**z + >>> expand_power_base((x*y)**z, force=True) + x**z*y**z + >>> expand_power_base(sin((x*y)**z), deep=False) + sin((x*y)**z) + >>> expand_power_base(sin((x*y)**z), force=True) + sin(x**z*y**z) + + >>> expand_power_base((2*sin(x))**y + (2*cos(x))**y) + 2**y*sin(x)**y + 2**y*cos(x)**y + + >>> expand_power_base((2*exp(y))**x) + 2**x*exp(y)**x + + >>> expand_power_base((2*cos(x))**y) + 2**y*cos(x)**y + + Notice that sums are left untouched. If this is not the desired behavior, + apply full ``expand()`` to the expression: + + >>> expand_power_base(((x+y)*z)**2) + z**2*(x + y)**2 + >>> (((x+y)*z)**2).expand() + x**2*z**2 + 2*x*y*z**2 + y**2*z**2 + + >>> expand_power_base((2*y)**(1+z)) + 2**(z + 1)*y**(z + 1) + >>> ((2*y)**(1+z)).expand() + 2*2**z*y**(z + 1) + + The power that is unexpanded can be expanded safely when + ``y != 0``, otherwise different values might be obtained for the expression: + + >>> prev = _ + + If we indicate that ``y`` is positive but then replace it with + a value of 0 after expansion, the expression becomes 0: + + >>> p = Symbol('p', positive=True) + >>> prev.subs(y, p).expand().subs(p, 0) + 0 + + But if ``z = -1`` the expression would not be zero: + + >>> prev.subs(y, 0).subs(z, -1) + 1 + + See Also + ======== + + expand + + """ + return sympify(expr).expand(deep=deep, log=False, mul=False, + power_exp=False, power_base=True, multinomial=False, + basic=False, force=force) + + +def expand_power_exp(expr, deep=True): + """ + Wrapper around expand that only uses the power_exp hint. + + See the expand docstring for more information. + + Examples + ======== + + >>> from sympy import expand_power_exp, Symbol + >>> from sympy.abc import x, y + >>> expand_power_exp(3**(y + 2)) + 9*3**y + >>> expand_power_exp(x**(y + 2)) + x**(y + 2) + + If ``x = 0`` the value of the expression depends on the + value of ``y``; if the expression were expanded the result + would be 0. So expansion is only done if ``x != 0``: + + >>> expand_power_exp(Symbol('x', zero=False)**(y + 2)) + x**2*x**y + """ + return sympify(expr).expand(deep=deep, complex=False, basic=False, + log=False, mul=False, power_exp=True, power_base=False, multinomial=False) + + +def count_ops(expr, visual=False): + """ + Return a representation (integer or expression) of the operations in expr. + + Parameters + ========== + + expr : Expr + If expr is an iterable, the sum of the op counts of the + items will be returned. + + visual : bool, optional + If ``False`` (default) then the sum of the coefficients of the + visual expression will be returned. + If ``True`` then the number of each type of operation is shown + with the core class types (or their virtual equivalent) multiplied by the + number of times they occur. + + Examples + ======== + + >>> from sympy.abc import a, b, x, y + >>> from sympy import sin, count_ops + + Although there is not a SUB object, minus signs are interpreted as + either negations or subtractions: + + >>> (x - y).count_ops(visual=True) + SUB + >>> (-x).count_ops(visual=True) + NEG + + Here, there are two Adds and a Pow: + + >>> (1 + a + b**2).count_ops(visual=True) + 2*ADD + POW + + In the following, an Add, Mul, Pow and two functions: + + >>> (sin(x)*x + sin(x)**2).count_ops(visual=True) + ADD + MUL + POW + 2*SIN + + for a total of 5: + + >>> (sin(x)*x + sin(x)**2).count_ops(visual=False) + 5 + + Note that "what you type" is not always what you get. The expression + 1/x/y is translated by sympy into 1/(x*y) so it gives a DIV and MUL rather + than two DIVs: + + >>> (1/x/y).count_ops(visual=True) + DIV + MUL + + The visual option can be used to demonstrate the difference in + operations for expressions in different forms. Here, the Horner + representation is compared with the expanded form of a polynomial: + + >>> eq=x*(1 + x*(2 + x*(3 + x))) + >>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True) + -MUL + 3*POW + + The count_ops function also handles iterables: + + >>> count_ops([x, sin(x), None, True, x + 2], visual=False) + 2 + >>> count_ops([x, sin(x), None, True, x + 2], visual=True) + ADD + SIN + >>> count_ops({x: sin(x), x + 2: y + 1}, visual=True) + 2*ADD + SIN + + """ + from .relational import Relational + from sympy.concrete.summations import Sum + from sympy.integrals.integrals import Integral + from sympy.logic.boolalg import BooleanFunction + from sympy.simplify.radsimp import fraction + + expr = sympify(expr) + if isinstance(expr, Expr) and not expr.is_Relational: + + ops = [] + args = [expr] + NEG = Symbol('NEG') + DIV = Symbol('DIV') + SUB = Symbol('SUB') + ADD = Symbol('ADD') + EXP = Symbol('EXP') + while args: + a = args.pop() + + # if the following fails because the object is + # not Basic type, then the object should be fixed + # since it is the intention that all args of Basic + # should themselves be Basic + if a.is_Rational: + #-1/3 = NEG + DIV + if a is not S.One: + if a.p < 0: + ops.append(NEG) + if a.q != 1: + ops.append(DIV) + continue + elif a.is_Mul or a.is_MatMul: + if _coeff_isneg(a): + ops.append(NEG) + if a.args[0] is S.NegativeOne: + a = a.as_two_terms()[1] + else: + a = -a + n, d = fraction(a) + if n.is_Integer: + ops.append(DIV) + if n < 0: + ops.append(NEG) + args.append(d) + continue # won't be -Mul but could be Add + elif d is not S.One: + if not d.is_Integer: + args.append(d) + ops.append(DIV) + args.append(n) + continue # could be -Mul + elif a.is_Add or a.is_MatAdd: + aargs = list(a.args) + negs = 0 + for i, ai in enumerate(aargs): + if _coeff_isneg(ai): + negs += 1 + args.append(-ai) + if i > 0: + ops.append(SUB) + else: + args.append(ai) + if i > 0: + ops.append(ADD) + if negs == len(aargs): # -x - y = NEG + SUB + ops.append(NEG) + elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD + ops.append(SUB - ADD) + continue + if a.is_Pow and a.exp is S.NegativeOne: + ops.append(DIV) + args.append(a.base) # won't be -Mul but could be Add + continue + if a == S.Exp1: + ops.append(EXP) + continue + if a.is_Pow and a.base == S.Exp1: + ops.append(EXP) + args.append(a.exp) + continue + if a.is_Mul or isinstance(a, LatticeOp): + o = Symbol(a.func.__name__.upper()) + # count the args + ops.append(o*(len(a.args) - 1)) + elif a.args and ( + a.is_Pow or a.is_Function or isinstance(a, (Derivative, Integral, Sum))): + # if it's not in the list above we don't + # consider a.func something to count, e.g. + # Tuple, MatrixSymbol, etc... + if isinstance(a.func, UndefinedFunction): + o = Symbol("FUNC_" + a.func.__name__.upper()) + else: + o = Symbol(a.func.__name__.upper()) + ops.append(o) + + if not a.is_Symbol: + args.extend(a.args) + + elif isinstance(expr, Dict): + ops = [count_ops(k, visual=visual) + + count_ops(v, visual=visual) for k, v in expr.items()] + elif iterable(expr): + ops = [count_ops(i, visual=visual) for i in expr] + elif isinstance(expr, (Relational, BooleanFunction)): + ops = [] + for arg in expr.args: + ops.append(count_ops(arg, visual=True)) + o = Symbol(func_name(expr, short=True).upper()) + ops.append(o) + elif not isinstance(expr, Basic): + ops = [] + else: # it's Basic not isinstance(expr, Expr): + if not isinstance(expr, Basic): + raise TypeError("Invalid type of expr") + else: + ops = [] + args = [expr] + while args: + a = args.pop() + + if a.args: + o = Symbol(type(a).__name__.upper()) + if a.is_Boolean: + ops.append(o*(len(a.args)-1)) + else: + ops.append(o) + args.extend(a.args) + + if not ops: + if visual: + return S.Zero + return 0 + + ops = Add(*ops) + + if visual: + return ops + + if ops.is_Number: + return int(ops) + + return sum(int((a.args or [1])[0]) for a in Add.make_args(ops)) + + +def nfloat(expr, n=15, exponent=False, dkeys=False): + """Make all Rationals in expr Floats except those in exponents + (unless the exponents flag is set to True) and those in undefined + functions. When processing dictionaries, do not modify the keys + unless ``dkeys=True``. + + Examples + ======== + + >>> from sympy import nfloat, cos, pi, sqrt + >>> from sympy.abc import x, y + >>> nfloat(x**4 + x/2 + cos(pi/3) + 1 + sqrt(y)) + x**4 + 0.5*x + sqrt(y) + 1.5 + >>> nfloat(x**4 + sqrt(y), exponent=True) + x**4.0 + y**0.5 + + Container types are not modified: + + >>> type(nfloat((1, 2))) is tuple + True + """ + from sympy.matrices.matrixbase import MatrixBase + + kw = {"n": n, "exponent": exponent, "dkeys": dkeys} + + if isinstance(expr, MatrixBase): + return expr.applyfunc(lambda e: nfloat(e, **kw)) + + # handling of iterable containers + if iterable(expr, exclude=str): + if isinstance(expr, (dict, Dict)): + if dkeys: + args = [tuple((nfloat(i, **kw) for i in a)) + for a in expr.items()] + else: + args = [(k, nfloat(v, **kw)) for k, v in expr.items()] + if isinstance(expr, dict): + return type(expr)(args) + else: + return expr.func(*args) + elif isinstance(expr, Basic): + return expr.func(*[nfloat(a, **kw) for a in expr.args]) + return type(expr)([nfloat(a, **kw) for a in expr]) + + rv = sympify(expr) + + if rv.is_Number: + return Float(rv, n) + elif rv.is_number: + # evalf doesn't always set the precision + rv = rv.n(n) + if rv.is_Number: + rv = Float(rv.n(n), n) + else: + pass # pure_complex(rv) is likely True + return rv + elif rv.is_Atom: + return rv + elif rv.is_Relational: + args_nfloat = (nfloat(arg, **kw) for arg in rv.args) + return rv.func(*args_nfloat) + + + # watch out for RootOf instances that don't like to have + # their exponents replaced with Dummies and also sometimes have + # problems with evaluating at low precision (issue 6393) + from sympy.polys.rootoftools import RootOf + rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)}) + + from .power import Pow + if not exponent: + reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)] + rv = rv.xreplace(dict(reps)) + rv = rv.n(n) + if not exponent: + rv = rv.xreplace({d.exp: p.exp for p, d in reps}) + else: + # Pow._eval_evalf special cases Integer exponents so if + # exponent is suppose to be handled we have to do so here + rv = rv.xreplace(Transform( + lambda x: Pow(x.base, Float(x.exp, n)), + lambda x: x.is_Pow and x.exp.is_Integer)) + + return rv.xreplace(Transform( + lambda x: x.func(*nfloat(x.args, n, exponent)), + lambda x: isinstance(x, Function) and not isinstance(x, AppliedUndef))) + + +from .symbol import Dummy, Symbol diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/intfunc.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/intfunc.py new file mode 100644 index 0000000000000000000000000000000000000000..50cb625dafcc1e795933311780e26423ddc6015a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/intfunc.py @@ -0,0 +1,530 @@ +""" +The routines here were removed from numbers.py, power.py, +digits.py and factor_.py so they could be imported into core +without raising circular import errors. + +Although the name 'intfunc' was chosen to represent functions that +work with integers, it can also be thought of as containing +internal/core functions that are needed by the classes of the core. +""" + +import math +import sys +from functools import lru_cache + +from .sympify import sympify +from .singleton import S +from sympy.external.gmpy import (gcd as number_gcd, lcm as number_lcm, sqrt, + iroot, bit_scan1, gcdext) +from sympy.utilities.misc import as_int, filldedent + + +def num_digits(n, base=10): + """Return the number of digits needed to express n in give base. + + Examples + ======== + + >>> from sympy.core.intfunc import num_digits + >>> num_digits(10) + 2 + >>> num_digits(10, 2) # 1010 -> 4 digits + 4 + >>> num_digits(-100, 16) # -64 -> 2 digits + 2 + + + Parameters + ========== + + n: integer + The number whose digits are counted. + + b: integer + The base in which digits are computed. + + See Also + ======== + sympy.ntheory.digits.digits, sympy.ntheory.digits.count_digits + """ + if base < 0: + raise ValueError('base must be int greater than 1') + if not n: + return 1 + e, t = integer_log(abs(n), base) + return 1 + e + + +def integer_log(n, b): + r""" + Returns ``(e, bool)`` where e is the largest nonnegative integer + such that :math:`|n| \geq |b^e|` and ``bool`` is True if $n = b^e$. + + Examples + ======== + + >>> from sympy import integer_log + >>> integer_log(125, 5) + (3, True) + >>> integer_log(17, 9) + (1, False) + + If the base is positive and the number negative the + return value will always be the same except for 2: + + >>> integer_log(-4, 2) + (2, False) + >>> integer_log(-16, 4) + (0, False) + + When the base is negative, the returned value + will only be True if the parity of the exponent is + correct for the sign of the base: + + >>> integer_log(4, -2) + (2, True) + >>> integer_log(8, -2) + (3, False) + >>> integer_log(-8, -2) + (3, True) + >>> integer_log(-4, -2) + (2, False) + + See Also + ======== + integer_nthroot + sympy.ntheory.primetest.is_square + sympy.ntheory.factor_.multiplicity + sympy.ntheory.factor_.perfect_power + """ + n = as_int(n) + b = as_int(b) + + if b < 0: + e, t = integer_log(abs(n), -b) + # (-2)**3 == -8 + # (-2)**2 = 4 + t = t and e % 2 == (n < 0) + return e, t + if b <= 1: + raise ValueError('base must be 2 or more') + if n < 0: + if b != 2: + return 0, False + e, t = integer_log(-n, b) + return e, False + if n == 0: + raise ValueError('n cannot be 0') + + if n < b: + return 0, n == 1 + if b == 2: + e = n.bit_length() - 1 + return e, trailing(n) == e + t = trailing(b) + if 2**t == b: + e = int(n.bit_length() - 1)//t + n_ = 1 << (t*e) + return e, n_ == n + + d = math.floor(math.log10(n) / math.log10(b)) + n_ = b ** d + while n_ <= n: # this will iterate 0, 1 or 2 times + d += 1 + n_ *= b + return d - (n_ > n), (n_ == n or n_//b == n) + + +def trailing(n): + """Count the number of trailing zero digits in the binary + representation of n, i.e. determine the largest power of 2 + that divides n. + + Examples + ======== + + >>> from sympy import trailing + >>> trailing(128) + 7 + >>> trailing(63) + 0 + + See Also + ======== + sympy.ntheory.factor_.multiplicity + + """ + if not n: + return 0 + return bit_scan1(int(n)) + + +@lru_cache(1024) +def igcd(*args): + """Computes nonnegative integer greatest common divisor. + + Explanation + =========== + + The algorithm is based on the well known Euclid's algorithm [1]_. To + improve speed, ``igcd()`` has its own caching mechanism. + If you do not need the cache mechanism, using ``sympy.external.gmpy.gcd``. + + Examples + ======== + + >>> from sympy import igcd + >>> igcd(2, 4) + 2 + >>> igcd(5, 10, 15) + 5 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euclidean_algorithm + + """ + if len(args) < 2: + raise TypeError("igcd() takes at least 2 arguments (%s given)" % len(args)) + return int(number_gcd(*map(as_int, args))) + + +igcd2 = math.gcd + + +def igcd_lehmer(a, b): + r"""Computes greatest common divisor of two integers. + + Explanation + =========== + + Euclid's algorithm for the computation of the greatest + common divisor ``gcd(a, b)`` of two (positive) integers + $a$ and $b$ is based on the division identity + $$ a = q \times b + r$$, + where the quotient $q$ and the remainder $r$ are integers + and $0 \le r < b$. Then each common divisor of $a$ and $b$ + divides $r$, and it follows that ``gcd(a, b) == gcd(b, r)``. + The algorithm works by constructing the sequence + r0, r1, r2, ..., where r0 = a, r1 = b, and each rn + is the remainder from the division of the two preceding + elements. + + In Python, ``q = a // b`` and ``r = a % b`` are obtained by the + floor division and the remainder operations, respectively. + These are the most expensive arithmetic operations, especially + for large a and b. + + Lehmer's algorithm [1]_ is based on the observation that the quotients + ``qn = r(n-1) // rn`` are in general small integers even + when a and b are very large. Hence the quotients can be + usually determined from a relatively small number of most + significant bits. + + The efficiency of the algorithm is further enhanced by not + computing each long remainder in Euclid's sequence. The remainders + are linear combinations of a and b with integer coefficients + derived from the quotients. The coefficients can be computed + as far as the quotients can be determined from the chosen + most significant parts of a and b. Only then a new pair of + consecutive remainders is computed and the algorithm starts + anew with this pair. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm + + """ + a, b = abs(as_int(a)), abs(as_int(b)) + if a < b: + a, b = b, a + + # The algorithm works by using one or two digit division + # whenever possible. The outer loop will replace the + # pair (a, b) with a pair of shorter consecutive elements + # of the Euclidean gcd sequence until a and b + # fit into two Python (long) int digits. + nbits = 2 * sys.int_info.bits_per_digit + + while a.bit_length() > nbits and b != 0: + # Quotients are mostly small integers that can + # be determined from most significant bits. + n = a.bit_length() - nbits + x, y = int(a >> n), int(b >> n) # most significant bits + + # Elements of the Euclidean gcd sequence are linear + # combinations of a and b with integer coefficients. + # Compute the coefficients of consecutive pairs + # a' = A*a + B*b, b' = C*a + D*b + # using small integer arithmetic as far as possible. + A, B, C, D = 1, 0, 0, 1 # initial values + + while True: + # The coefficients alternate in sign while looping. + # The inner loop combines two steps to keep track + # of the signs. + + # At this point we have + # A > 0, B <= 0, C <= 0, D > 0, + # x' = x + B <= x < x" = x + A, + # y' = y + C <= y < y" = y + D, + # and + # x'*N <= a' < x"*N, y'*N <= b' < y"*N, + # where N = 2**n. + + # Now, if y' > 0, and x"//y' and x'//y" agree, + # then their common value is equal to q = a'//b'. + # In addition, + # x'%y" = x' - q*y" < x" - q*y' = x"%y', + # and + # (x'%y")*N < a'%b' < (x"%y')*N. + + # On the other hand, we also have x//y == q, + # and therefore + # x'%y" = x + B - q*(y + D) = x%y + B', + # x"%y' = x + A - q*(y + C) = x%y + A', + # where + # B' = B - q*D < 0, A' = A - q*C > 0. + + if y + C <= 0: + break + q = (x + A) // (y + C) + + # Now x'//y" <= q, and equality holds if + # x' - q*y" = (x - q*y) + (B - q*D) >= 0. + # This is a minor optimization to avoid division. + x_qy, B_qD = x - q * y, B - q * D + if x_qy + B_qD < 0: + break + + # Next step in the Euclidean sequence. + x, y = y, x_qy + A, B, C, D = C, D, A - q * C, B_qD + + # At this point the signs of the coefficients + # change and their roles are interchanged. + # A <= 0, B > 0, C > 0, D < 0, + # x' = x + A <= x < x" = x + B, + # y' = y + D < y < y" = y + C. + + if y + D <= 0: + break + q = (x + B) // (y + D) + x_qy, A_qC = x - q * y, A - q * C + if x_qy + A_qC < 0: + break + + x, y = y, x_qy + A, B, C, D = C, D, A_qC, B - q * D + # Now the conditions on top of the loop + # are again satisfied. + # A > 0, B < 0, C < 0, D > 0. + + if B == 0: + # This can only happen when y == 0 in the beginning + # and the inner loop does nothing. + # Long division is forced. + a, b = b, a % b + continue + + # Compute new long arguments using the coefficients. + a, b = A * a + B * b, C * a + D * b + + # Small divisors. Finish with the standard algorithm. + while b: + a, b = b, a % b + + return a + + +def ilcm(*args): + """Computes integer least common multiple. + + Examples + ======== + + >>> from sympy import ilcm + >>> ilcm(5, 10) + 10 + >>> ilcm(7, 3) + 21 + >>> ilcm(5, 10, 15) + 30 + + """ + if len(args) < 2: + raise TypeError("ilcm() takes at least 2 arguments (%s given)" % len(args)) + return int(number_lcm(*map(as_int, args))) + + +def igcdex(a, b): + """Returns x, y, g such that g = x*a + y*b = gcd(a, b). + + Examples + ======== + + >>> from sympy.core.intfunc import igcdex + >>> igcdex(2, 3) + (-1, 1, 1) + >>> igcdex(10, 12) + (-1, 1, 2) + + >>> x, y, g = igcdex(100, 2004) + >>> x, y, g + (-20, 1, 4) + >>> x*100 + y*2004 + 4 + + """ + g, x, y = gcdext(int(a), int(b)) + return x, y, g + + +def mod_inverse(a, m): + r""" + Return the number $c$ such that, $a \times c = 1 \pmod{m}$ + where $c$ has the same sign as $m$. If no such value exists, + a ValueError is raised. + + Examples + ======== + + >>> from sympy import mod_inverse, S + + Suppose we wish to find multiplicative inverse $x$ of + 3 modulo 11. This is the same as finding $x$ such + that $3x = 1 \pmod{11}$. One value of x that satisfies + this congruence is 4. Because $3 \times 4 = 12$ and $12 = 1 \pmod{11}$. + This is the value returned by ``mod_inverse``: + + >>> mod_inverse(3, 11) + 4 + >>> mod_inverse(-3, 11) + 7 + + When there is a common factor between the numerators of + `a` and `m` the inverse does not exist: + + >>> mod_inverse(2, 4) + Traceback (most recent call last): + ... + ValueError: inverse of 2 mod 4 does not exist + + >>> mod_inverse(S(2)/7, S(5)/2) + 7/2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Modular_multiplicative_inverse + .. [2] https://en.wikipedia.org/wiki/Extended_Euclidean_algorithm + """ + c = None + try: + a, m = as_int(a), as_int(m) + if m != 1 and m != -1: + x, _, g = igcdex(a, m) + if g == 1: + c = x % m + except ValueError: + a, m = sympify(a), sympify(m) + if not (a.is_number and m.is_number): + raise TypeError( + filldedent( + """ + Expected numbers for arguments; symbolic `mod_inverse` + is not implemented + but symbolic expressions can be handled with the + similar function, + sympy.polys.polytools.invert""" + ) + ) + big = m > 1 + if big not in (S.true, S.false): + raise ValueError("m > 1 did not evaluate; try to simplify %s" % m) + elif big: + c = 1 / a + if c is None: + raise ValueError("inverse of %s (mod %s) does not exist" % (a, m)) + return c + + +def isqrt(n): + r""" Return the largest integer less than or equal to `\sqrt{n}`. + + Parameters + ========== + + n : non-negative integer + + Returns + ======= + + int : `\left\lfloor\sqrt{n}\right\rfloor` + + Raises + ====== + + ValueError + If n is negative. + TypeError + If n is of a type that cannot be compared to ``int``. + Therefore, a TypeError is raised for ``str``, but not for ``float``. + + Examples + ======== + + >>> from sympy.core.intfunc import isqrt + >>> isqrt(0) + 0 + >>> isqrt(9) + 3 + >>> isqrt(10) + 3 + >>> isqrt("30") + Traceback (most recent call last): + ... + TypeError: '<' not supported between instances of 'str' and 'int' + >>> from sympy.core.numbers import Rational + >>> isqrt(Rational(-1, 2)) + Traceback (most recent call last): + ... + ValueError: n must be nonnegative + + """ + if n < 0: + raise ValueError("n must be nonnegative") + return int(sqrt(int(n))) + + +def integer_nthroot(y, n): + """ + Return a tuple containing x = floor(y**(1/n)) + and a boolean indicating whether the result is exact (that is, + whether x**n == y). + + Examples + ======== + + >>> from sympy import integer_nthroot + >>> integer_nthroot(16, 2) + (4, True) + >>> integer_nthroot(26, 2) + (5, False) + + To simply determine if a number is a perfect square, the is_square + function should be used: + + >>> from sympy.ntheory.primetest import is_square + >>> is_square(26) + False + + See Also + ======== + sympy.ntheory.primetest.is_square + integer_log + """ + x, b = iroot(as_int(y), as_int(n)) + return int(x), b diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/kind.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/kind.py new file mode 100644 index 0000000000000000000000000000000000000000..83c5929eda14114659f2a5a72eb2d8b91a560f0e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/kind.py @@ -0,0 +1,388 @@ +""" +Module to efficiently partition SymPy objects. + +This system is introduced because class of SymPy object does not always +represent the mathematical classification of the entity. For example, +``Integral(1, x)`` and ``Integral(Matrix([1,2]), x)`` are both instance +of ``Integral`` class. However the former is number and the latter is +matrix. + +One way to resolve this is defining subclass for each mathematical type, +such as ``MatAdd`` for the addition between matrices. Basic algebraic +operation such as addition or multiplication take this approach, but +defining every class for every mathematical object is not scalable. + +Therefore, we define the "kind" of the object and let the expression +infer the kind of itself from its arguments. Function and class can +filter the arguments by their kind, and behave differently according to +the type of itself. + +This module defines basic kinds for core objects. Other kinds such as +``ArrayKind`` or ``MatrixKind`` can be found in corresponding modules. + +.. notes:: + This approach is experimental, and can be replaced or deleted in the future. + See https://github.com/sympy/sympy/pull/20549. +""" + +from collections import defaultdict + +from .cache import cacheit +from sympy.multipledispatch.dispatcher import (Dispatcher, + ambiguity_warn, ambiguity_register_error_ignore_dup, + str_signature, RaiseNotImplementedError) + + +class KindMeta(type): + """ + Metaclass for ``Kind``. + + Assigns empty ``dict`` as class attribute ``_inst`` for every class, + in order to endow singleton-like behavior. + """ + def __new__(cls, clsname, bases, dct): + dct['_inst'] = {} + return super().__new__(cls, clsname, bases, dct) + + +class Kind(object, metaclass=KindMeta): + """ + Base class for kinds. + + Kind of the object represents the mathematical classification that + the entity falls into. It is expected that functions and classes + recognize and filter the argument by its kind. + + Kind of every object must be carefully selected so that it shows the + intention of design. Expressions may have different kind according + to the kind of its arguments. For example, arguments of ``Add`` + must have common kind since addition is group operator, and the + resulting ``Add()`` has the same kind. + + For the performance, each kind is as broad as possible and is not + based on set theory. For example, ``NumberKind`` includes not only + complex number but expression containing ``S.Infinity`` or ``S.NaN`` + which are not strictly number. + + Kind may have arguments as parameter. For example, ``MatrixKind()`` + may be constructed with one element which represents the kind of its + elements. + + ``Kind`` behaves in singleton-like fashion. Same signature will + return the same object. + + """ + def __new__(cls, *args): + if args in cls._inst: + inst = cls._inst[args] + else: + inst = super().__new__(cls) + cls._inst[args] = inst + return inst + + +class _UndefinedKind(Kind): + """ + Default kind for all SymPy object. If the kind is not defined for + the object, or if the object cannot infer the kind from its + arguments, this will be returned. + + Examples + ======== + + >>> from sympy import Expr + >>> Expr().kind + UndefinedKind + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "UndefinedKind" + +UndefinedKind = _UndefinedKind() + + +class _NumberKind(Kind): + """ + Kind for all numeric object. + + This kind represents every number, including complex numbers, + infinity and ``S.NaN``. Other objects such as quaternions do not + have this kind. + + Most ``Expr`` are initially designed to represent the number, so + this will be the most common kind in SymPy core. For example + ``Symbol()``, which represents a scalar, has this kind as long as it + is commutative. + + Numbers form a field. Any operation between number-kind objects will + result this kind as well. + + Examples + ======== + + >>> from sympy import S, oo, Symbol + >>> S.One.kind + NumberKind + >>> (-oo).kind + NumberKind + >>> S.NaN.kind + NumberKind + + Commutative symbol are treated as number. + + >>> x = Symbol('x') + >>> x.kind + NumberKind + >>> Symbol('y', commutative=False).kind + UndefinedKind + + Operation between numbers results number. + + >>> (x+1).kind + NumberKind + + See Also + ======== + + sympy.core.expr.Expr.is_Number : check if the object is strictly + subclass of ``Number`` class. + + sympy.core.expr.Expr.is_number : check if the object is number + without any free symbol. + + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "NumberKind" + +NumberKind = _NumberKind() + + +class _BooleanKind(Kind): + """ + Kind for boolean objects. + + SymPy's ``S.true``, ``S.false``, and built-in ``True`` and ``False`` + have this kind. Boolean number ``1`` and ``0`` are not relevant. + + Examples + ======== + + >>> from sympy import S, Q + >>> S.true.kind + BooleanKind + >>> Q.even(3).kind + BooleanKind + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "BooleanKind" + +BooleanKind = _BooleanKind() + + +class KindDispatcher: + """ + Dispatcher to select a kind from multiple kinds by binary dispatching. + + .. notes:: + This approach is experimental, and can be replaced or deleted in + the future. + + Explanation + =========== + + SymPy object's :obj:`sympy.core.kind.Kind()` vaguely represents the + algebraic structure where the object belongs to. Therefore, with + given operation, we can always find a dominating kind among the + different kinds. This class selects the kind by recursive binary + dispatching. If the result cannot be determined, ``UndefinedKind`` + is returned. + + Examples + ======== + + Multiplication between numbers return number. + + >>> from sympy import NumberKind, Mul + >>> Mul._kind_dispatcher(NumberKind, NumberKind) + NumberKind + + Multiplication between number and unknown-kind object returns unknown kind. + + >>> from sympy import UndefinedKind + >>> Mul._kind_dispatcher(NumberKind, UndefinedKind) + UndefinedKind + + Any number and order of kinds is allowed. + + >>> Mul._kind_dispatcher(UndefinedKind, NumberKind) + UndefinedKind + >>> Mul._kind_dispatcher(NumberKind, UndefinedKind, NumberKind) + UndefinedKind + + Since matrix forms a vector space over scalar field, multiplication + between matrix with numeric element and number returns matrix with + numeric element. + + >>> from sympy.matrices import MatrixKind + >>> Mul._kind_dispatcher(MatrixKind(NumberKind), NumberKind) + MatrixKind(NumberKind) + + If a matrix with number element and another matrix with unknown-kind + element are multiplied, we know that the result is matrix but the + kind of its elements is unknown. + + >>> Mul._kind_dispatcher(MatrixKind(NumberKind), MatrixKind(UndefinedKind)) + MatrixKind(UndefinedKind) + + Parameters + ========== + + name : str + + commutative : bool, optional + If True, binary dispatch will be automatically registered in + reversed order as well. + + doc : str, optional + + """ + def __init__(self, name, commutative=False, doc=None): + self.name = name + self.doc = doc + self.commutative = commutative + self._dispatcher = Dispatcher(name) + + def __repr__(self): + return "" % self.name + + def register(self, *types, **kwargs): + """ + Register the binary dispatcher for two kind classes. + + If *self.commutative* is ``True``, signature in reversed order is + automatically registered as well. + """ + on_ambiguity = kwargs.pop("on_ambiguity", None) + if not on_ambiguity: + if self.commutative: + on_ambiguity = ambiguity_register_error_ignore_dup + else: + on_ambiguity = ambiguity_warn + kwargs.update(on_ambiguity=on_ambiguity) + + if not len(types) == 2: + raise RuntimeError( + "Only binary dispatch is supported, but got %s types: <%s>." % ( + len(types), str_signature(types) + )) + + def _(func): + self._dispatcher.add(types, func, **kwargs) + if self.commutative: + self._dispatcher.add(tuple(reversed(types)), func, **kwargs) + return _ + + def __call__(self, *args, **kwargs): + if self.commutative: + kinds = frozenset(args) + else: + kinds = [] + prev = None + for a in args: + if prev is not a: + kinds.append(a) + prev = a + return self.dispatch_kinds(kinds, **kwargs) + + @cacheit + def dispatch_kinds(self, kinds, **kwargs): + # Quick exit for the case where all kinds are same + if len(kinds) == 1: + result, = kinds + if not isinstance(result, Kind): + raise RuntimeError("%s is not a kind." % result) + return result + + for i,kind in enumerate(kinds): + if not isinstance(kind, Kind): + raise RuntimeError("%s is not a kind." % kind) + + if i == 0: + result = kind + else: + prev_kind = result + + t1, t2 = type(prev_kind), type(kind) + k1, k2 = prev_kind, kind + func = self._dispatcher.dispatch(t1, t2) + if func is None and self.commutative: + # try reversed order + func = self._dispatcher.dispatch(t2, t1) + k1, k2 = k2, k1 + if func is None: + # unregistered kind relation + result = UndefinedKind + else: + result = func(k1, k2) + if not isinstance(result, Kind): + raise RuntimeError( + "Dispatcher for {!r} and {!r} must return a Kind, but got {!r}".format( + prev_kind, kind, result + )) + + return result + + @property + def __doc__(self): + docs = [ + "Kind dispatcher : %s" % self.name, + "Note that support for this is experimental. See the docs for :class:`KindDispatcher` for details" + ] + + if self.doc: + docs.append(self.doc) + + s = "Registered kind classes\n" + s += '=' * len(s) + docs.append(s) + + amb_sigs = [] + + typ_sigs = defaultdict(list) + for sigs in self._dispatcher.ordering[::-1]: + key = self._dispatcher.funcs[sigs] + typ_sigs[key].append(sigs) + + for func, sigs in typ_sigs.items(): + + sigs_str = ', '.join('<%s>' % str_signature(sig) for sig in sigs) + + if isinstance(func, RaiseNotImplementedError): + amb_sigs.append(sigs_str) + continue + + s = 'Inputs: %s\n' % sigs_str + s += '-' * len(s) + '\n' + if func.__doc__: + s += func.__doc__.strip() + else: + s += func.__name__ + docs.append(s) + + if amb_sigs: + s = "Ambiguous kind classes\n" + s += '=' * len(s) + docs.append(s) + + s = '\n'.join(amb_sigs) + docs.append(s) + + return '\n\n'.join(docs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/logic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/logic.py new file mode 100644 index 0000000000000000000000000000000000000000..1c318063049a4657952c8ca84e0f0fdeef62a207 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/logic.py @@ -0,0 +1,425 @@ +"""Logic expressions handling + +NOTE +---- + +at present this is mainly needed for facts.py, feel free however to improve +this stuff for general purpose. +""" + +from __future__ import annotations +from typing import Optional + +# Type of a fuzzy bool +FuzzyBool = Optional[bool] + + +def _torf(args): + """Return True if all args are True, False if they + are all False, else None. + + >>> from sympy.core.logic import _torf + >>> _torf((True, True)) + True + >>> _torf((False, False)) + False + >>> _torf((True, False)) + """ + sawT = sawF = False + for a in args: + if a is True: + if sawF: + return + sawT = True + elif a is False: + if sawT: + return + sawF = True + else: + return + return sawT + + +def _fuzzy_group(args, quick_exit=False): + """Return True if all args are True, None if there is any None else False + unless ``quick_exit`` is True (then return None as soon as a second False + is seen. + + ``_fuzzy_group`` is like ``fuzzy_and`` except that it is more + conservative in returning a False, waiting to make sure that all + arguments are True or False and returning None if any arguments are + None. It also has the capability of permiting only a single False and + returning None if more than one is seen. For example, the presence of a + single transcendental amongst rationals would indicate that the group is + no longer rational; but a second transcendental in the group would make the + determination impossible. + + + Examples + ======== + + >>> from sympy.core.logic import _fuzzy_group + + By default, multiple Falses mean the group is broken: + + >>> _fuzzy_group([False, False, True]) + False + + If multiple Falses mean the group status is unknown then set + `quick_exit` to True so None can be returned when the 2nd False is seen: + + >>> _fuzzy_group([False, False, True], quick_exit=True) + + But if only a single False is seen then the group is known to + be broken: + + >>> _fuzzy_group([False, True, True], quick_exit=True) + False + + """ + saw_other = False + for a in args: + if a is True: + continue + if a is None: + return + if quick_exit and saw_other: + return + saw_other = True + return not saw_other + + +def fuzzy_bool(x): + """Return True, False or None according to x. + + Whereas bool(x) returns True or False, fuzzy_bool allows + for the None value and non-false values (which become None), too. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_bool + >>> from sympy.abc import x + >>> fuzzy_bool(x), fuzzy_bool(None) + (None, None) + >>> bool(x), bool(None) + (True, False) + + """ + if x is None: + return None + if x in (True, False): + return bool(x) + + +def fuzzy_and(args): + """Return True (all True), False (any False) or None. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_and + >>> from sympy import Dummy + + If you had a list of objects to test the commutivity of + and you want the fuzzy_and logic applied, passing an + iterator will allow the commutativity to only be computed + as many times as necessary. With this list, False can be + returned after analyzing the first symbol: + + >>> syms = [Dummy(commutative=False), Dummy()] + >>> fuzzy_and(s.is_commutative for s in syms) + False + + That False would require less work than if a list of pre-computed + items was sent: + + >>> fuzzy_and([s.is_commutative for s in syms]) + False + """ + + rv = True + for ai in args: + ai = fuzzy_bool(ai) + if ai is False: + return False + if rv: # this will stop updating if a None is ever trapped + rv = ai + return rv + + +def fuzzy_not(v): + """ + Not in fuzzy logic + + Return None if `v` is None else `not v`. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_not + >>> fuzzy_not(True) + False + >>> fuzzy_not(None) + >>> fuzzy_not(False) + True + + """ + if v is None: + return v + else: + return not v + + +def fuzzy_or(args): + """ + Or in fuzzy logic. Returns True (any True), False (all False), or None + + See the docstrings of fuzzy_and and fuzzy_not for more info. fuzzy_or is + related to the two by the standard De Morgan's law. + + >>> from sympy.core.logic import fuzzy_or + >>> fuzzy_or([True, False]) + True + >>> fuzzy_or([True, None]) + True + >>> fuzzy_or([False, False]) + False + >>> print(fuzzy_or([False, None])) + None + + """ + rv = False + for ai in args: + ai = fuzzy_bool(ai) + if ai is True: + return True + if rv is False: # this will stop updating if a None is ever trapped + rv = ai + return rv + + +def fuzzy_xor(args): + """Return None if any element of args is not True or False, else + True (if there are an odd number of True elements), else False.""" + t = 0 + for a in args: + ai = fuzzy_bool(a) + if ai: + t += 1 + elif ai is None: + return + return t % 2 == 1 + + +def fuzzy_nand(args): + """Return False if all args are True, True if they are all False, + else None.""" + return fuzzy_not(fuzzy_and(args)) + + +class Logic: + """Logical expression""" + # {} 'op' -> LogicClass + op_2class: dict[str, type[Logic]] = {} + + def __new__(cls, *args): + obj = object.__new__(cls) + obj.args = args + return obj + + def __getnewargs__(self): + return self.args + + def __hash__(self): + return hash((type(self).__name__,) + tuple(self.args)) + + def __eq__(a, b): + if not isinstance(b, type(a)): + return False + else: + return a.args == b.args + + def __ne__(a, b): + if not isinstance(b, type(a)): + return True + else: + return a.args != b.args + + def __lt__(self, other): + if self.__cmp__(other) == -1: + return True + return False + + def __cmp__(self, other): + if type(self) is not type(other): + a = str(type(self)) + b = str(type(other)) + else: + a = self.args + b = other.args + return (a > b) - (a < b) + + def __str__(self): + return '%s(%s)' % (self.__class__.__name__, + ', '.join(str(a) for a in self.args)) + + __repr__ = __str__ + + @staticmethod + def fromstring(text): + """Logic from string with space around & and | but none after !. + + e.g. + + !a & b | c + """ + lexpr = None # current logical expression + schedop = None # scheduled operation + for term in text.split(): + # operation symbol + if term in '&|': + if schedop is not None: + raise ValueError( + 'double op forbidden: "%s %s"' % (term, schedop)) + if lexpr is None: + raise ValueError( + '%s cannot be in the beginning of expression' % term) + schedop = term + continue + if '&' in term or '|' in term: + raise ValueError('& and | must have space around them') + if term[0] == '!': + if len(term) == 1: + raise ValueError('do not include space after "!"') + term = Not(term[1:]) + + # already scheduled operation, e.g. '&' + if schedop: + lexpr = Logic.op_2class[schedop](lexpr, term) + schedop = None + continue + + # this should be atom + if lexpr is not None: + raise ValueError( + 'missing op between "%s" and "%s"' % (lexpr, term)) + + lexpr = term + + # let's check that we ended up in correct state + if schedop is not None: + raise ValueError('premature end-of-expression in "%s"' % text) + if lexpr is None: + raise ValueError('"%s" is empty' % text) + + # everything looks good now + return lexpr + + +class AndOr_Base(Logic): + + def __new__(cls, *args): + bargs = [] + for a in args: + if a == cls.op_x_notx: + return a + elif a == (not cls.op_x_notx): + continue # skip this argument + bargs.append(a) + + args = sorted(set(cls.flatten(bargs)), key=hash) + + for a in args: + if Not(a) in args: + return cls.op_x_notx + + if len(args) == 1: + return args.pop() + elif len(args) == 0: + return not cls.op_x_notx + + return Logic.__new__(cls, *args) + + @classmethod + def flatten(cls, args): + # quick-n-dirty flattening for And and Or + args_queue = list(args) + res = [] + + while True: + try: + arg = args_queue.pop(0) + except IndexError: + break + if isinstance(arg, Logic): + if isinstance(arg, cls): + args_queue.extend(arg.args) + continue + res.append(arg) + + args = tuple(res) + return args + + +class And(AndOr_Base): + op_x_notx = False + + def _eval_propagate_not(self): + # !(a&b&c ...) == !a | !b | !c ... + return Or(*[Not(a) for a in self.args]) + + # (a|b|...) & c == (a&c) | (b&c) | ... + def expand(self): + + # first locate Or + for i, arg in enumerate(self.args): + if isinstance(arg, Or): + arest = self.args[:i] + self.args[i + 1:] + + orterms = [And(*(arest + (a,))) for a in arg.args] + for j in range(len(orterms)): + if isinstance(orterms[j], Logic): + orterms[j] = orterms[j].expand() + + res = Or(*orterms) + return res + + return self + + +class Or(AndOr_Base): + op_x_notx = True + + def _eval_propagate_not(self): + # !(a|b|c ...) == !a & !b & !c ... + return And(*[Not(a) for a in self.args]) + + +class Not(Logic): + + def __new__(cls, arg): + if isinstance(arg, str): + return Logic.__new__(cls, arg) + + elif isinstance(arg, bool): + return not arg + elif isinstance(arg, Not): + return arg.args[0] + + elif isinstance(arg, Logic): + # XXX this is a hack to expand right from the beginning + arg = arg._eval_propagate_not() + return arg + + else: + raise ValueError('Not: unknown argument %r' % (arg,)) + + @property + def arg(self): + return self.args[0] + + +Logic.op_2class['&'] = And +Logic.op_2class['|'] = Or +Logic.op_2class['!'] = Not diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mod.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mod.py new file mode 100644 index 0000000000000000000000000000000000000000..8be0c56e497eb5ed0041801488044b50f907962c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mod.py @@ -0,0 +1,260 @@ +from .add import Add +from .exprtools import gcd_terms +from .function import DefinedFunction +from .kind import NumberKind +from .logic import fuzzy_and, fuzzy_not +from .mul import Mul +from .numbers import equal_valued +from .relational import is_le, is_lt, is_ge, is_gt +from .singleton import S + + +class Mod(DefinedFunction): + """Represents a modulo operation on symbolic expressions. + + Parameters + ========== + + p : Expr + Dividend. + + q : Expr + Divisor. + + Notes + ===== + + The convention used is the same as Python's: the remainder always has the + same sign as the divisor. + + Many objects can be evaluated modulo ``n`` much faster than they can be + evaluated directly (or at all). For this, ``evaluate=False`` is + necessary to prevent eager evaluation: + + >>> from sympy import binomial, factorial, Mod, Pow + >>> Mod(Pow(2, 10**16, evaluate=False), 97) + 61 + >>> Mod(factorial(10**9, evaluate=False), 10**9 + 9) + 712524808 + >>> Mod(binomial(10**18, 10**12, evaluate=False), (10**5 + 3)**2) + 3744312326 + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x**2 % y + Mod(x**2, y) + >>> _.subs({x: 5, y: 6}) + 1 + + """ + + kind = NumberKind + + @classmethod + def eval(cls, p, q): + def number_eval(p, q): + """Try to return p % q if both are numbers or +/-p is known + to be less than or equal q. + """ + + if q.is_zero: + raise ZeroDivisionError("Modulo by zero") + if p is S.NaN or q is S.NaN or p.is_finite is False or q.is_finite is False: + return S.NaN + if p is S.Zero or p in (q, -q) or (p.is_integer and q == 1): + return S.Zero + + if q.is_Number: + if p.is_Number: + return p%q + if q == 2: + if p.is_even: + return S.Zero + elif p.is_odd: + return S.One + + if hasattr(p, '_eval_Mod'): + rv = getattr(p, '_eval_Mod')(q) + if rv is not None: + return rv + + # by ratio + r = p/q + if r.is_integer: + return S.Zero + try: + d = int(r) + except TypeError: + pass + else: + if isinstance(d, int): + rv = p - d*q + if (rv*q < 0) == True: + rv += q + return rv + + # by difference + # -2|q| < p < 2|q| + if q.is_positive: + comp1, comp2 = is_le, is_lt + elif q.is_negative: + comp1, comp2 = is_ge, is_gt + else: + return + ls = -2*q + r = p - q + for _ in range(4): + if not comp1(ls, p): + return + if comp2(r, ls): + return p - ls + ls += q + + rv = number_eval(p, q) + if rv is not None: + return rv + + # denest + if isinstance(p, cls): + qinner = p.args[1] + if qinner % q == 0: + return cls(p.args[0], q) + elif (qinner*(q - qinner)).is_nonnegative: + # |qinner| < |q| and have same sign + return p + elif isinstance(-p, cls): + qinner = (-p).args[1] + if qinner % q == 0: + return cls(-(-p).args[0], q) + elif (qinner*(q + qinner)).is_nonpositive: + # |qinner| < |q| and have different sign + return p + elif isinstance(p, Add): + # separating into modulus and non modulus + both_l = non_mod_l, mod_l = [], [] + for arg in p.args: + both_l[isinstance(arg, cls)].append(arg) + # if q same for all + if mod_l and all(inner.args[1] == q for inner in mod_l): + net = Add(*non_mod_l) + Add(*[i.args[0] for i in mod_l]) + return cls(net, q) + + elif isinstance(p, Mul): + # separating into modulus and non modulus + both_l = non_mod_l, mod_l = [], [] + for arg in p.args: + both_l[isinstance(arg, cls)].append(arg) + + if mod_l and all(inner.args[1] == q for inner in mod_l) and all(t.is_integer for t in p.args) and q.is_integer: + # finding distributive term + non_mod_l = [cls(x, q) for x in non_mod_l] + mod = [] + non_mod = [] + for j in non_mod_l: + if isinstance(j, cls): + mod.append(j.args[0]) + else: + non_mod.append(j) + prod_mod = Mul(*mod) + prod_non_mod = Mul(*non_mod) + prod_mod1 = Mul(*[i.args[0] for i in mod_l]) + net = prod_mod1*prod_mod + return prod_non_mod*cls(net, q) + + if q.is_Integer and q is not S.One: + if all(t.is_integer for t in p.args): + non_mod_l = [i % q if i.is_Integer else i for i in p.args] + if any(iq is S.Zero for iq in non_mod_l): + return S.Zero + + p = Mul(*(non_mod_l + mod_l)) + + # XXX other possibilities? + + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import gcd + + # extract gcd; any further simplification should be done by the user + try: + G = gcd(p, q) + if not equal_valued(G, 1): + p, q = [gcd_terms(i/G, clear=False, fraction=False) + for i in (p, q)] + except PolynomialError: # issue 21373 + G = S.One + pwas, qwas = p, q + + # simplify terms + # (x + y + 2) % x -> Mod(y + 2, x) + if p.is_Add: + args = [] + for i in p.args: + a = cls(i, q) + if a.count(cls) > i.count(cls): + args.append(i) + else: + args.append(a) + if args != list(p.args): + p = Add(*args) + + else: + # handle coefficients if they are not Rational + # since those are not handled by factor_terms + # e.g. Mod(.6*x, .3*y) -> 0.3*Mod(2*x, y) + cp, p = p.as_coeff_Mul() + cq, q = q.as_coeff_Mul() + ok = False + if not cp.is_Rational or not cq.is_Rational: + r = cp % cq + if equal_valued(r, 0): + G *= cq + p *= int(cp/cq) + ok = True + if not ok: + p = cp*p + q = cq*q + + # simple -1 extraction + if p.could_extract_minus_sign() and q.could_extract_minus_sign(): + G, p, q = [-i for i in (G, p, q)] + + # check again to see if p and q can now be handled as numbers + rv = number_eval(p, q) + if rv is not None: + return rv*G + + # put 1.0 from G on inside + if G.is_Float and equal_valued(G, 1): + p *= G + return cls(p, q, evaluate=False) + elif G.is_Mul and G.args[0].is_Float and equal_valued(G.args[0], 1): + p = G.args[0]*p + G = Mul._from_args(G.args[1:]) + return G*cls(p, q, evaluate=(p, q) != (pwas, qwas)) + + def _eval_is_integer(self): + p, q = self.args + if fuzzy_and([p.is_integer, q.is_integer, fuzzy_not(q.is_zero)]): + return True + + def _eval_is_nonnegative(self): + if self.args[1].is_positive: + return True + + def _eval_is_nonpositive(self): + if self.args[1].is_negative: + return True + + def _eval_rewrite_as_floor(self, a, b, **kwargs): + from sympy.functions.elementary.integers import floor + return a - b*floor(a/b) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.functions.elementary.integers import floor + return self.rewrite(floor)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.functions.elementary.integers import floor + return self.rewrite(floor)._eval_nseries(x, n, logx=logx, cdir=cdir) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mul.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mul.py new file mode 100644 index 0000000000000000000000000000000000000000..fd83c8610a76db4e7bc7a2a71b98e437bd00a28e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/mul.py @@ -0,0 +1,2214 @@ +from __future__ import annotations +from typing import TYPE_CHECKING, ClassVar + +from collections import defaultdict +from functools import reduce +from itertools import product +import operator + +from .sympify import sympify +from .basic import Basic, _args_sortkey +from .singleton import S +from .operations import AssocOp, AssocOpDispatcher +from .cache import cacheit +from .intfunc import integer_nthroot, trailing +from .logic import fuzzy_not, _fuzzy_group +from .expr import Expr +from .parameters import global_parameters +from .kind import KindDispatcher +from .traversal import bottom_up +from sympy.utilities.iterables import sift + + +# internal marker to indicate: +# "there are still non-commutative objects -- don't forget to process them" +class NC_Marker: + is_Order = False + is_Mul = False + is_Number = False + is_Poly = False + + is_commutative = False + + +def _mulsort(args): + # in-place sorting of args + args.sort(key=_args_sortkey) + + +def _unevaluated_Mul(*args): + """Return a well-formed unevaluated Mul: Numbers are collected and + put in slot 0, any arguments that are Muls will be flattened, and args + are sorted. Use this when args have changed but you still want to return + an unevaluated Mul. + + Examples + ======== + + >>> from sympy.core.mul import _unevaluated_Mul as uMul + >>> from sympy import S, sqrt, Mul + >>> from sympy.abc import x + >>> a = uMul(*[S(3.0), x, S(2)]) + >>> a.args[0] + 6.00000000000000 + >>> a.args[1] + x + + Two unevaluated Muls with the same arguments will + always compare as equal during testing: + + >>> m = uMul(sqrt(2), sqrt(3)) + >>> m == uMul(sqrt(3), sqrt(2)) + True + >>> u = Mul(sqrt(3), sqrt(2), evaluate=False) + >>> m == uMul(u) + True + >>> m == Mul(*m.args) + False + + """ + cargs = [] + ncargs = [] + args = list(args) + co = S.One + for a in args: + if a.is_Mul: + a_c, a_nc = a.args_cnc() + args.extend(a_c) # grow args + ncargs.extend(a_nc) + elif a.is_Number: + co *= a + elif a.is_commutative: + cargs.append(a) + else: + ncargs.append(a) + _mulsort(cargs) + if co is not S.One: + cargs.insert(0, co) + return Mul._from_args(cargs+ncargs) + + +class Mul(Expr, AssocOp): + """ + Expression representing multiplication operation for algebraic field. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Every argument of ``Mul()`` must be ``Expr``. Infix operator ``*`` + on most scalar objects in SymPy calls this class. + + Another use of ``Mul()`` is to represent the structure of abstract + multiplication so that its arguments can be substituted to return + different class. Refer to examples section for this. + + ``Mul()`` evaluates the argument unless ``evaluate=False`` is passed. + The evaluation logic includes: + + 1. Flattening + ``Mul(x, Mul(y, z))`` -> ``Mul(x, y, z)`` + + 2. Identity removing + ``Mul(x, 1, y)`` -> ``Mul(x, y)`` + + 3. Exponent collecting by ``.as_base_exp()`` + ``Mul(x, x**2)`` -> ``Pow(x, 3)`` + + 4. Term sorting + ``Mul(y, x, 2)`` -> ``Mul(2, x, y)`` + + Since multiplication can be vector space operation, arguments may + have the different :obj:`sympy.core.kind.Kind()`. Kind of the + resulting object is automatically inferred. + + Examples + ======== + + >>> from sympy import Mul + >>> from sympy.abc import x, y + >>> Mul(x, 1) + x + >>> Mul(x, x) + x**2 + + If ``evaluate=False`` is passed, result is not evaluated. + + >>> Mul(1, 2, evaluate=False) + 1*2 + >>> Mul(x, x, evaluate=False) + x*x + + ``Mul()`` also represents the general structure of multiplication + operation. + + >>> from sympy import MatrixSymbol + >>> A = MatrixSymbol('A', 2,2) + >>> expr = Mul(x,y).subs({y:A}) + >>> expr + x*A + >>> type(expr) + + + See Also + ======== + + MatMul + + """ + __slots__ = () + + is_Mul = True + + _args_type = Expr + _kind_dispatcher = KindDispatcher("Mul_kind_dispatcher", commutative=True) + + identity: ClassVar[Expr] + + @property + def kind(self): + arg_kinds = (a.kind for a in self.args) + return self._kind_dispatcher(*arg_kinds) + + if TYPE_CHECKING: + + def __new__(cls, *args: Expr | complex, evaluate: bool=True) -> Expr: # type: ignore + ... + + @property + def args(self) -> tuple[Expr, ...]: + ... + + def could_extract_minus_sign(self): + if self == (-self): + return False # e.g. zoo*x == -zoo*x + c = self.args[0] + return c.is_Number and c.is_extended_negative + + def __neg__(self): + c, args = self.as_coeff_mul() + if args[0] is not S.ComplexInfinity: + c = -c + if c is not S.One: + if args[0].is_Number: + args = list(args) + if c is S.NegativeOne: + args[0] = -args[0] + else: + args[0] *= c + else: + args = (c,) + args + return self._from_args(args, self.is_commutative) + + @classmethod + def flatten(cls, seq): + """Return commutative, noncommutative and order arguments by + combining related terms. + + Notes + ===== + * In an expression like ``a*b*c``, Python process this through SymPy + as ``Mul(Mul(a, b), c)``. This can have undesirable consequences. + + - Sometimes terms are not combined as one would like: + {c.f. https://github.com/sympy/sympy/issues/4596} + + >>> from sympy import Mul, sqrt + >>> from sympy.abc import x, y, z + >>> 2*(x + 1) # this is the 2-arg Mul behavior + 2*x + 2 + >>> y*(x + 1)*2 + 2*y*(x + 1) + >>> 2*(x + 1)*y # 2-arg result will be obtained first + y*(2*x + 2) + >>> Mul(2, x + 1, y) # all 3 args simultaneously processed + 2*y*(x + 1) + >>> 2*((x + 1)*y) # parentheses can control this behavior + 2*y*(x + 1) + + Powers with compound bases may not find a single base to + combine with unless all arguments are processed at once. + Post-processing may be necessary in such cases. + {c.f. https://github.com/sympy/sympy/issues/5728} + + >>> a = sqrt(x*sqrt(y)) + >>> a**3 + (x*sqrt(y))**(3/2) + >>> Mul(a,a,a) + (x*sqrt(y))**(3/2) + >>> a*a*a + x*sqrt(y)*sqrt(x*sqrt(y)) + >>> _.subs(a.base, z).subs(z, a.base) + (x*sqrt(y))**(3/2) + + - If more than two terms are being multiplied then all the + previous terms will be re-processed for each new argument. + So if each of ``a``, ``b`` and ``c`` were :class:`Mul` + expression, then ``a*b*c`` (or building up the product + with ``*=``) will process all the arguments of ``a`` and + ``b`` twice: once when ``a*b`` is computed and again when + ``c`` is multiplied. + + Using ``Mul(a, b, c)`` will process all arguments once. + + * The results of Mul are cached according to arguments, so flatten + will only be called once for ``Mul(a, b, c)``. If you can + structure a calculation so the arguments are most likely to be + repeats then this can save time in computing the answer. For + example, say you had a Mul, M, that you wished to divide by ``d[i]`` + and multiply by ``n[i]`` and you suspect there are many repeats + in ``n``. It would be better to compute ``M*n[i]/d[i]`` rather + than ``M/d[i]*n[i]`` since every time n[i] is a repeat, the + product, ``M*n[i]`` will be returned without flattening -- the + cached value will be returned. If you divide by the ``d[i]`` + first (and those are more unique than the ``n[i]``) then that will + create a new Mul, ``M/d[i]`` the args of which will be traversed + again when it is multiplied by ``n[i]``. + + {c.f. https://github.com/sympy/sympy/issues/5706} + + This consideration is moot if the cache is turned off. + + NB + -- + The validity of the above notes depends on the implementation + details of Mul and flatten which may change at any time. Therefore, + you should only consider them when your code is highly performance + sensitive. + + Removal of 1 from the sequence is already handled by AssocOp.__new__. + """ + + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.matrices.expressions import MatrixExpr + rv = None + if len(seq) == 2: + a, b = seq + if b.is_Rational: + a, b = b, a + seq = [a, b] + assert a is not S.One + if a.is_Rational and not a.is_zero: + r, b = b.as_coeff_Mul() + if b.is_Add: + if r is not S.One: # 2-arg hack + # leave the Mul as a Mul? + ar = a*r + if ar is S.One: + arb = b + else: + arb = cls(a*r, b, evaluate=False) + rv = [arb], [], None + elif global_parameters.distribute and b.is_commutative: + newb = Add(*[_keep_coeff(a, bi) for bi in b.args]) + rv = [newb], [], None + if rv: + return rv + + # apply associativity, separate commutative part of seq + c_part = [] # out: commutative factors + nc_part = [] # out: non-commutative factors + + nc_seq = [] + + coeff = S.One # standalone term + # e.g. 3 * ... + + c_powers = [] # (base,exp) n + # e.g. (x,n) for x + + num_exp = [] # (num-base, exp) y + # e.g. (3, y) for ... * 3 * ... + + neg1e = S.Zero # exponent on -1 extracted from Number-based Pow and I + + pnum_rat = {} # (num-base, Rat-exp) 1/2 + # e.g. (3, 1/2) for ... * 3 * ... + + order_symbols = None + + # --- PART 1 --- + # + # "collect powers and coeff": + # + # o coeff + # o c_powers + # o num_exp + # o neg1e + # o pnum_rat + # + # NOTE: this is optimized for all-objects-are-commutative case + for o in seq: + # O(x) + if o.is_Order: + o, order_symbols = o.as_expr_variables(order_symbols) + + # Mul([...]) + if o.is_Mul: + if o.is_commutative: + seq.extend(o.args) # XXX zerocopy? + + else: + # NCMul can have commutative parts as well + for q in o.args: + if q.is_commutative: + seq.append(q) + else: + nc_seq.append(q) + + # append non-commutative marker, so we don't forget to + # process scheduled non-commutative objects + seq.append(NC_Marker) + + continue + + # 3 + elif o.is_Number: + if o is S.NaN or coeff is S.ComplexInfinity and o.is_zero: + # we know for sure the result will be nan + return [S.NaN], [], None + elif coeff.is_Number or isinstance(coeff, AccumBounds): # it could be zoo + coeff *= o + if coeff is S.NaN: + # we know for sure the result will be nan + return [S.NaN], [], None + continue + + elif isinstance(o, AccumBounds): + coeff = o.__mul__(coeff) + continue + + elif o is S.ComplexInfinity: + if not coeff: + # 0 * zoo = NaN + return [S.NaN], [], None + coeff = S.ComplexInfinity + continue + + elif not coeff and isinstance(o, Add) and any( + _ in (S.NegativeInfinity, S.ComplexInfinity, S.Infinity) + for __ in o.args for _ in Mul.make_args(__)): + # e.g 0 * (x + oo) = NaN but not + # 0 * (1 + Integral(x, (x, 0, oo))) which is + # treated like 0 * x -> 0 + return [S.NaN], [], None + + elif o is S.ImaginaryUnit: + neg1e += S.Half + continue + + elif o.is_commutative: + # e + # o = b + b, e = o.as_base_exp() + + # y + # 3 + if o.is_Pow: + if b.is_Number: + + # get all the factors with numeric base so they can be + # combined below, but don't combine negatives unless + # the exponent is an integer + if e.is_Rational: + if e.is_Integer: + coeff *= Pow(b, e) # it is an unevaluated power + continue + elif e.is_negative: # also a sign of an unevaluated power + seq.append(Pow(b, e)) + continue + elif b.is_negative: + neg1e += e + b = -b + if b is not S.One: + pnum_rat.setdefault(b, []).append(e) + continue + elif b.is_positive or e.is_integer: + num_exp.append((b, e)) + continue + + c_powers.append((b, e)) + + # NON-COMMUTATIVE + # TODO: Make non-commutative exponents not combine automatically + else: + if o is not NC_Marker: + nc_seq.append(o) + + # process nc_seq (if any) + while nc_seq: + o = nc_seq.pop(0) + if not nc_part: + nc_part.append(o) + continue + + # b c b+c + # try to combine last terms: a * a -> a + o1 = nc_part.pop() + b1, e1 = o1.as_base_exp() + b2, e2 = o.as_base_exp() + new_exp = e1 + e2 + # Only allow powers to combine if the new exponent is + # not an Add. This allow things like a**2*b**3 == a**5 + # if a.is_commutative == False, but prohibits + # a**x*a**y and x**a*x**b from combining (x,y commute). + if b1 == b2 and (not new_exp.is_Add): + o12 = b1 ** new_exp + + # now o12 could be a commutative object + if o12.is_commutative: + seq.append(o12) + continue + else: + nc_seq.insert(0, o12) + + else: + nc_part.extend([o1, o]) + + # We do want a combined exponent if it would not be an Add, such as + # y 2y 3y + # x * x -> x + # We determine if two exponents have the same term by using + # as_coeff_Mul. + # + # Unfortunately, this isn't smart enough to consider combining into + # exponents that might already be adds, so things like: + # z - y y + # x * x will be left alone. This is because checking every possible + # combination can slow things down. + + # gather exponents of common bases... + def _gather(c_powers): + common_b = {} # b:e + for b, e in c_powers: + co = e.as_coeff_Mul() + common_b.setdefault(b, {}).setdefault( + co[1], []).append(co[0]) + for b, d in common_b.items(): + for di, li in d.items(): + d[di] = Add(*li) + new_c_powers = [] + for b, e in common_b.items(): + new_c_powers.extend([(b, c*t) for t, c in e.items()]) + return new_c_powers + + # in c_powers + c_powers = _gather(c_powers) + + # and in num_exp + num_exp = _gather(num_exp) + + # --- PART 2 --- + # + # o process collected powers (x**0 -> 1; x**1 -> x; otherwise Pow) + # o combine collected powers (2**x * 3**x -> 6**x) + # with numeric base + + # ................................ + # now we have: + # - coeff: + # - c_powers: (b, e) + # - num_exp: (2, e) + # - pnum_rat: {(1/3, [1/3, 2/3, 1/4])} + + # 0 1 + # x -> 1 x -> x + + # this should only need to run twice; if it fails because + # it needs to be run more times, perhaps this should be + # changed to a "while True" loop -- the only reason it + # isn't such now is to allow a less-than-perfect result to + # be obtained rather than raising an error or entering an + # infinite loop + for i in range(2): + new_c_powers = [] + changed = False + for b, e in c_powers: + if e.is_zero: + # canceling out infinities yields NaN + if (b.is_Add or b.is_Mul) and any(infty in b.args + for infty in (S.ComplexInfinity, S.Infinity, + S.NegativeInfinity)): + return [S.NaN], [], None + continue + if e is S.One: + if b.is_Number: + coeff *= b + continue + p = b + if e is not S.One: + p = Pow(b, e) + # check to make sure that the base doesn't change + # after exponentiation; to allow for unevaluated + # Pow, we only do so if b is not already a Pow + if p.is_Pow and not b.is_Pow: + bi = b + b, e = p.as_base_exp() + if b != bi: + changed = True + c_part.append(p) + new_c_powers.append((b, e)) + # there might have been a change, but unless the base + # matches some other base, there is nothing to do + if changed and len({ + b for b, e in new_c_powers}) != len(new_c_powers): + # start over again + c_part = [] + c_powers = _gather(new_c_powers) + else: + break + + # x x x + # 2 * 3 -> 6 + inv_exp_dict = {} # exp:Mul(num-bases) x x + # e.g. x:6 for ... * 2 * 3 * ... + for b, e in num_exp: + inv_exp_dict.setdefault(e, []).append(b) + for e, b in inv_exp_dict.items(): + inv_exp_dict[e] = cls(*b) + c_part.extend([Pow(b, e) for e, b in inv_exp_dict.items() if e]) + + # b, e -> e' = sum(e), b + # {(1/5, [1/3]), (1/2, [1/12, 1/4]} -> {(1/3, [1/5, 1/2])} + comb_e = {} + for b, e in pnum_rat.items(): + comb_e.setdefault(Add(*e), []).append(b) + del pnum_rat + # process them, reducing exponents to values less than 1 + # and updating coeff if necessary else adding them to + # num_rat for further processing + num_rat = [] + for e, b in comb_e.items(): + b = cls(*b) + if e.q == 1: + coeff *= Pow(b, e) + continue + if e.p > e.q: + e_i, ep = divmod(e.p, e.q) + coeff *= Pow(b, e_i) + e = Rational(ep, e.q) + num_rat.append((b, e)) + del comb_e + + # extract gcd of bases in num_rat + # 2**(1/3)*6**(1/4) -> 2**(1/3+1/4)*3**(1/4) + pnew = defaultdict(list) + i = 0 # steps through num_rat which may grow + while i < len(num_rat): + bi, ei = num_rat[i] + if bi == 1: + i += 1 + continue + grow = [] + for j in range(i + 1, len(num_rat)): + bj, ej = num_rat[j] + g = bi.gcd(bj) + if g is not S.One: + # 4**r1*6**r2 -> 2**(r1+r2) * 2**r1 * 3**r2 + # this might have a gcd with something else + e = ei + ej + if e.q == 1: + coeff *= Pow(g, e) + else: + if e.p > e.q: + e_i, ep = divmod(e.p, e.q) # change e in place + coeff *= Pow(g, e_i) + e = Rational(ep, e.q) + grow.append((g, e)) + # update the jth item + num_rat[j] = (bj/g, ej) + # update bi that we are checking with + bi = bi/g + if bi is S.One: + break + if bi is not S.One: + obj = Pow(bi, ei) + if obj.is_Number: + coeff *= obj + else: + # changes like sqrt(12) -> 2*sqrt(3) + for obj in Mul.make_args(obj): + if obj.is_Number: + coeff *= obj + else: + assert obj.is_Pow + bi, ei = obj.args + pnew[ei].append(bi) + + num_rat.extend(grow) + i += 1 + + # combine bases of the new powers + for e, b in pnew.items(): + pnew[e] = cls(*b) + + # handle -1 and I + if neg1e: + # treat I as (-1)**(1/2) and compute -1's total exponent + p, q = neg1e.as_numer_denom() + # if the integer part is odd, extract -1 + n, p = divmod(p, q) + if n % 2: + coeff = -coeff + # if it's a multiple of 1/2 extract I + if q == 2: + c_part.append(S.ImaginaryUnit) + elif p: + # see if there is any positive base this power of + # -1 can join + neg1e = Rational(p, q) + for e, b in pnew.items(): + if e == neg1e and b.is_positive: + pnew[e] = -b + break + else: + # keep it separate; we've already evaluated it as + # much as possible so evaluate=False + c_part.append(Pow(S.NegativeOne, neg1e, evaluate=False)) + + # add all the pnew powers + c_part.extend([Pow(b, e) for e, b in pnew.items()]) + + # oo, -oo + if coeff in (S.Infinity, S.NegativeInfinity): + def _handle_for_oo(c_part, coeff_sign): + new_c_part = [] + for t in c_part: + if t.is_extended_positive: + continue + if t.is_extended_negative: + coeff_sign *= -1 + continue + new_c_part.append(t) + return new_c_part, coeff_sign + c_part, coeff_sign = _handle_for_oo(c_part, 1) + nc_part, coeff_sign = _handle_for_oo(nc_part, coeff_sign) + coeff *= coeff_sign + + # zoo + if coeff is S.ComplexInfinity: + # zoo might be + # infinite_real + bounded_im + # bounded_real + infinite_im + # infinite_real + infinite_im + # and non-zero real or imaginary will not change that status. + c_part = [c for c in c_part if not (fuzzy_not(c.is_zero) and + c.is_extended_real is not None)] + nc_part = [c for c in nc_part if not (fuzzy_not(c.is_zero) and + c.is_extended_real is not None)] + + # 0 + elif coeff.is_zero: + # we know for sure the result will be 0 except the multiplicand + # is infinity or a matrix + if any(isinstance(c, MatrixExpr) for c in nc_part): + return [coeff], nc_part, order_symbols + if any(c.is_finite == False for c in c_part): + return [S.NaN], [], order_symbols + return [coeff], [], order_symbols + + # check for straggling Numbers that were produced + _new = [] + for i in c_part: + if i.is_Number: + coeff *= i + else: + _new.append(i) + c_part = _new + + # order commutative part canonically + _mulsort(c_part) + + # current code expects coeff to be always in slot-0 + if coeff is not S.One: + c_part.insert(0, coeff) + + # we are done + if (global_parameters.distribute and not nc_part and len(c_part) == 2 and + c_part[0].is_Number and c_part[0].is_finite and c_part[1].is_Add): + # 2*(1+a) -> 2 + 2 * a + coeff = c_part[0] + c_part = [Add(*[coeff*f for f in c_part[1].args])] + + return c_part, nc_part, order_symbols + + def _eval_power(self, expt): + + # don't break up NC terms: (A*B)**3 != A**3*B**3, it is A*B*A*B*A*B + cargs, nc = self.args_cnc(split_1=False) + + if expt.is_Integer: + return Mul(*[Pow(b, expt, evaluate=False) for b in cargs]) * \ + Pow(Mul._from_args(nc), expt, evaluate=False) + if expt.is_Rational and expt.q == 2: + if self.is_imaginary: + a = self.as_real_imag()[1] + if a.is_Rational: + n, d = abs(a/2).as_numer_denom() + n, t = integer_nthroot(n, 2) + if t: + d, t = integer_nthroot(d, 2) + if t: + from sympy.functions.elementary.complexes import sign + r = sympify(n)/d + return _unevaluated_Mul(r**expt.p, (1 + sign(a)*S.ImaginaryUnit)**expt.p) + + p = Pow(self, expt, evaluate=False) + + if expt.is_Rational or expt.is_Float: + return p._eval_expand_power_base() + + return p + + @classmethod + def class_key(cls): + return 3, 0, cls.__name__ + + def _eval_evalf(self, prec): + c, m = self.as_coeff_Mul() + if c is S.NegativeOne: + if m.is_Mul: + rv = -AssocOp._eval_evalf(m, prec) + else: + mnew = m._eval_evalf(prec) + if mnew is not None: + m = mnew + rv = -m + else: + rv = AssocOp._eval_evalf(self, prec) + if rv.is_number: + return rv.expand() + return rv + + @property + def _mpc_(self): + """ + Convert self to an mpmath mpc if possible + """ + from .numbers import Float + im_part, imag_unit = self.as_coeff_Mul() + if imag_unit is not S.ImaginaryUnit: + # ValueError may seem more reasonable but since it's a @property, + # we need to use AttributeError to keep from confusing things like + # hasattr. + raise AttributeError("Cannot convert Mul to mpc. Must be of the form Number*I") + + return (Float(0)._mpf_, Float(im_part)._mpf_) + + @cacheit + def as_two_terms(self): + """Return head and tail of self. + + This is the most efficient way to get the head and tail of an + expression. + + - if you want only the head, use self.args[0]; + - if you want to process the arguments of the tail then use + self.as_coef_mul() which gives the head and a tuple containing + the arguments of the tail when treated as a Mul. + - if you want the coefficient when self is treated as an Add + then use self.as_coeff_add()[0] + + Examples + ======== + + >>> from sympy.abc import x, y + >>> (3*x*y).as_two_terms() + (3, x*y) + """ + args = self.args + + if len(args) == 1: + return S.One, self + elif len(args) == 2: + return args + + else: + return args[0], self._new_rawargs(*args[1:]) + + @cacheit + def as_coeff_mul(self, *deps, rational=True, **kwargs): + if deps: + l1, l2 = sift(self.args, lambda x: x.has(*deps), binary=True) + return self._new_rawargs(*l2), tuple(l1) + args = self.args + if args[0].is_Number: + if not rational or args[0].is_Rational: + return args[0], args[1:] + elif args[0].is_extended_negative: + return S.NegativeOne, (-args[0],) + args[1:] + return S.One, args + + def as_coeff_Mul(self, rational=False): + """ + Efficiently extract the coefficient of a product. + """ + coeff, args = self.args[0], self.args[1:] + + if coeff.is_Number: + if not rational or coeff.is_Rational: + if len(args) == 1: + return coeff, args[0] + else: + return coeff, self._new_rawargs(*args) + elif coeff.is_extended_negative: + return S.NegativeOne, self._new_rawargs(*((-coeff,) + args)) + return S.One, self + + def as_real_imag(self, deep=True, **hints): + from sympy.functions.elementary.complexes import Abs, im, re + other = [] + coeffr = [] + coeffi = [] + addterms = S.One + for a in self.args: + r, i = a.as_real_imag() + if i.is_zero: + coeffr.append(r) + elif r.is_zero: + coeffi.append(i*S.ImaginaryUnit) + elif a.is_commutative: + aconj = a.conjugate() if other else None + # search for complex conjugate pairs: + for i, x in enumerate(other): + if x == aconj: + coeffr.append(Abs(x)**2) + del other[i] + break + else: + if a.is_Add: + addterms *= a + else: + other.append(a) + else: + other.append(a) + m = self.func(*other) + if hints.get('ignore') == m: + return + if len(coeffi) % 2: + imco = im(coeffi.pop(0)) + # all other pairs make a real factor; they will be + # put into reco below + else: + imco = S.Zero + reco = self.func(*(coeffr + coeffi)) + r, i = (reco*re(m), reco*im(m)) + if addterms == 1: + if m == 1: + if imco.is_zero: + return (reco, S.Zero) + else: + return (S.Zero, reco*imco) + if imco is S.Zero: + return (r, i) + return (-imco*i, imco*r) + from .function import expand_mul + addre, addim = expand_mul(addterms, deep=False).as_real_imag() + if imco is S.Zero: + return (r*addre - i*addim, i*addre + r*addim) + else: + r, i = -imco*i, imco*r + return (r*addre - i*addim, r*addim + i*addre) + + @staticmethod + def _expandsums(sums): + """ + Helper function for _eval_expand_mul. + + sums must be a list of instances of Basic. + """ + + L = len(sums) + if L == 1: + return sums[0].args + terms = [] + left = Mul._expandsums(sums[:L//2]) + right = Mul._expandsums(sums[L//2:]) + + terms = [Mul(a, b) for a in left for b in right] + added = Add(*terms) + return Add.make_args(added) # it may have collapsed down to one term + + def _eval_expand_mul(self, **hints): + from sympy.simplify.radsimp import fraction + + # Handle things like 1/(x*(x + 1)), which are automatically converted + # to 1/x*1/(x + 1) + expr = self + # default matches fraction's default + n, d = fraction(expr, hints.get('exact', False)) + if d.is_Mul: + n, d = [i._eval_expand_mul(**hints) if i.is_Mul else i + for i in (n, d)] + expr = n/d + if not expr.is_Mul: + return expr + + plain, sums, rewrite = [], [], False + for factor in expr.args: + if factor.is_Add: + sums.append(factor) + rewrite = True + else: + if factor.is_commutative: + plain.append(factor) + else: + sums.append(Basic(factor)) # Wrapper + + if not rewrite: + return expr + else: + plain = self.func(*plain) + if sums: + deep = hints.get("deep", False) + terms = self.func._expandsums(sums) + args = [] + for term in terms: + t = self.func(plain, term) + if t.is_Mul and any(a.is_Add for a in t.args) and deep: + t = t._eval_expand_mul() + args.append(t) + return Add(*args) + else: + return plain + + @cacheit + def _eval_derivative(self, s): + args = list(self.args) + terms = [] + for i in range(len(args)): + d = args[i].diff(s) + if d: + # Note: reduce is used in step of Mul as Mul is unable to + # handle subtypes and operation priority: + terms.append(reduce(lambda x, y: x*y, (args[:i] + [d] + args[i + 1:]), S.One)) + return Add.fromiter(terms) + + @cacheit + def _eval_derivative_n_times(self, s, n): + from .function import AppliedUndef + from .symbol import Symbol, symbols, Dummy + if not isinstance(s, (AppliedUndef, Symbol)): + # other types of s may not be well behaved, e.g. + # (cos(x)*sin(y)).diff([[x, y, z]]) + return super()._eval_derivative_n_times(s, n) + from .numbers import Integer + args = self.args + m = len(args) + if isinstance(n, (int, Integer)): + # https://en.wikipedia.org/wiki/General_Leibniz_rule#More_than_two_factors + terms = [] + from sympy.ntheory.multinomial import multinomial_coefficients_iterator + for kvals, c in multinomial_coefficients_iterator(m, n): + p = Mul(*[arg.diff((s, k)) for k, arg in zip(kvals, args)]) + terms.append(c * p) + return Add(*terms) + from sympy.concrete.summations import Sum + from sympy.functions.combinatorial.factorials import factorial + from sympy.functions.elementary.miscellaneous import Max + kvals = symbols("k1:%i" % m, cls=Dummy) + klast = n - sum(kvals) + nfact = factorial(n) + e, l = (# better to use the multinomial? + nfact/prod(map(factorial, kvals))/factorial(klast)*\ + Mul(*[args[t].diff((s, kvals[t])) for t in range(m-1)])*\ + args[-1].diff((s, Max(0, klast))), + [(k, 0, n) for k in kvals]) + return Sum(e, *l) + + def _eval_difference_delta(self, n, step): + from sympy.series.limitseq import difference_delta as dd + arg0 = self.args[0] + rest = Mul(*self.args[1:]) + return (arg0.subs(n, n + step) * dd(rest, n, step) + dd(arg0, n, step) * + rest) + + def _matches_simple(self, expr, repl_dict): + # handle (w*3).matches('x*5') -> {w: x*5/3} + coeff, terms = self.as_coeff_Mul() + terms = Mul.make_args(terms) + if len(terms) == 1: + newexpr = self.__class__._combine_inverse(expr, coeff) + return terms[0].matches(newexpr, repl_dict) + return + + def matches(self, expr, repl_dict=None, old=False): + expr = sympify(expr) + if self.is_commutative and expr.is_commutative: + return self._matches_commutative(expr, repl_dict, old) + elif self.is_commutative is not expr.is_commutative: + return None + + # Proceed only if both both expressions are non-commutative + c1, nc1 = self.args_cnc() + c2, nc2 = expr.args_cnc() + c1, c2 = [c or [1] for c in [c1, c2]] + + # TODO: Should these be self.func? + comm_mul_self = Mul(*c1) + comm_mul_expr = Mul(*c2) + + repl_dict = comm_mul_self.matches(comm_mul_expr, repl_dict, old) + + # If the commutative arguments didn't match and aren't equal, then + # then the expression as a whole doesn't match + if not repl_dict and c1 != c2: + return None + + # Now match the non-commutative arguments, expanding powers to + # multiplications + nc1 = Mul._matches_expand_pows(nc1) + nc2 = Mul._matches_expand_pows(nc2) + + repl_dict = Mul._matches_noncomm(nc1, nc2, repl_dict) + + return repl_dict or None + + @staticmethod + def _matches_expand_pows(arg_list): + new_args = [] + for arg in arg_list: + if arg.is_Pow and arg.exp > 0: + new_args.extend([arg.base] * arg.exp) + else: + new_args.append(arg) + return new_args + + @staticmethod + def _matches_noncomm(nodes, targets, repl_dict=None): + """Non-commutative multiplication matcher. + + `nodes` is a list of symbols within the matcher multiplication + expression, while `targets` is a list of arguments in the + multiplication expression being matched against. + """ + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + # List of possible future states to be considered + agenda = [] + # The current matching state, storing index in nodes and targets + state = (0, 0) + node_ind, target_ind = state + # Mapping between wildcard indices and the index ranges they match + wildcard_dict = {} + + while target_ind < len(targets) and node_ind < len(nodes): + node = nodes[node_ind] + + if node.is_Wild: + Mul._matches_add_wildcard(wildcard_dict, state) + + states_matches = Mul._matches_new_states(wildcard_dict, state, + nodes, targets) + if states_matches: + new_states, new_matches = states_matches + agenda.extend(new_states) + if new_matches: + for match in new_matches: + repl_dict[match] = new_matches[match] + if not agenda: + return None + else: + state = agenda.pop() + node_ind, target_ind = state + + return repl_dict + + @staticmethod + def _matches_add_wildcard(dictionary, state): + node_ind, target_ind = state + if node_ind in dictionary: + begin, end = dictionary[node_ind] + dictionary[node_ind] = (begin, target_ind) + else: + dictionary[node_ind] = (target_ind, target_ind) + + @staticmethod + def _matches_new_states(dictionary, state, nodes, targets): + node_ind, target_ind = state + node = nodes[node_ind] + target = targets[target_ind] + + # Don't advance at all if we've exhausted the targets but not the nodes + if target_ind >= len(targets) - 1 and node_ind < len(nodes) - 1: + return None + + if node.is_Wild: + match_attempt = Mul._matches_match_wilds(dictionary, node_ind, + nodes, targets) + if match_attempt: + # If the same node has been matched before, don't return + # anything if the current match is diverging from the previous + # match + other_node_inds = Mul._matches_get_other_nodes(dictionary, + nodes, node_ind) + for ind in other_node_inds: + other_begin, other_end = dictionary[ind] + curr_begin, curr_end = dictionary[node_ind] + + other_targets = targets[other_begin:other_end + 1] + current_targets = targets[curr_begin:curr_end + 1] + + for curr, other in zip(current_targets, other_targets): + if curr != other: + return None + + # A wildcard node can match more than one target, so only the + # target index is advanced + new_state = [(node_ind, target_ind + 1)] + # Only move on to the next node if there is one + if node_ind < len(nodes) - 1: + new_state.append((node_ind + 1, target_ind + 1)) + return new_state, match_attempt + else: + # If we're not at a wildcard, then make sure we haven't exhausted + # nodes but not targets, since in this case one node can only match + # one target + if node_ind >= len(nodes) - 1 and target_ind < len(targets) - 1: + return None + + match_attempt = node.matches(target) + + if match_attempt: + return [(node_ind + 1, target_ind + 1)], match_attempt + elif node == target: + return [(node_ind + 1, target_ind + 1)], None + else: + return None + + @staticmethod + def _matches_match_wilds(dictionary, wildcard_ind, nodes, targets): + """Determine matches of a wildcard with sub-expression in `target`.""" + wildcard = nodes[wildcard_ind] + begin, end = dictionary[wildcard_ind] + terms = targets[begin:end + 1] + # TODO: Should this be self.func? + mult = Mul(*terms) if len(terms) > 1 else terms[0] + return wildcard.matches(mult) + + @staticmethod + def _matches_get_other_nodes(dictionary, nodes, node_ind): + """Find other wildcards that may have already been matched.""" + ind_node = nodes[node_ind] + return [ind for ind in dictionary if nodes[ind] == ind_node] + + @staticmethod + def _combine_inverse(lhs, rhs): + """ + Returns lhs/rhs, but treats arguments like symbols, so things + like oo/oo return 1 (instead of a nan) and ``I`` behaves like + a symbol instead of sqrt(-1). + """ + from sympy.simplify.simplify import signsimp + from .symbol import Dummy + if lhs == rhs: + return S.One + + def check(l, r): + if l.is_Float and r.is_comparable: + # if both objects are added to 0 they will share the same "normalization" + # and are more likely to compare the same. Since Add(foo, 0) will not allow + # the 0 to pass, we use __add__ directly. + return l.__add__(0) == r.evalf().__add__(0) + return False + if check(lhs, rhs) or check(rhs, lhs): + return S.One + if any(i.is_Pow or i.is_Mul for i in (lhs, rhs)): + # gruntz and limit wants a literal I to not combine + # with a power of -1 + d = Dummy('I') + _i = {S.ImaginaryUnit: d} + i_ = {d: S.ImaginaryUnit} + a = lhs.xreplace(_i).as_powers_dict() + b = rhs.xreplace(_i).as_powers_dict() + blen = len(b) + for bi in tuple(b.keys()): + if bi in a: + a[bi] -= b.pop(bi) + if not a[bi]: + a.pop(bi) + if len(b) != blen: + lhs = Mul(*[k**v for k, v in a.items()]).xreplace(i_) + rhs = Mul(*[k**v for k, v in b.items()]).xreplace(i_) + rv = lhs/rhs + srv = signsimp(rv) + return srv if srv.is_Number else rv + + def as_powers_dict(self): + d = defaultdict(int) + for term in self.args: + for b, e in term.as_powers_dict().items(): + d[b] += e + return d + + def as_numer_denom(self): + # don't use _from_args to rebuild the numerators and denominators + # as the order is not guaranteed to be the same once they have + # been separated from each other + numers, denoms = list(zip(*[f.as_numer_denom() for f in self.args])) + return self.func(*numers), self.func(*denoms) + + def as_base_exp(self): + e1 = None + bases = [] + nc = 0 + for m in self.args: + b, e = m.as_base_exp() + if not b.is_commutative: + nc += 1 + if e1 is None: + e1 = e + elif e != e1 or nc > 1 or not e.is_Integer: + return self, S.One + bases.append(b) + return self.func(*bases), e1 + + def _eval_is_polynomial(self, syms): + return all(term._eval_is_polynomial(syms) for term in self.args) + + def _eval_is_rational_function(self, syms): + return all(term._eval_is_rational_function(syms) for term in self.args) + + def _eval_is_meromorphic(self, x, a): + return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args), + quick_exit=True) + + def _eval_is_algebraic_expr(self, syms): + return all(term._eval_is_algebraic_expr(syms) for term in self.args) + + _eval_is_commutative = lambda self: _fuzzy_group( + a.is_commutative for a in self.args) + + def _eval_is_complex(self): + comp = _fuzzy_group(a.is_complex for a in self.args) + if comp is False: + if any(a.is_infinite for a in self.args): + if any(a.is_zero is not False for a in self.args): + return None + return False + return comp + + def _eval_is_zero_infinite_helper(self): + # + # Helper used by _eval_is_zero and _eval_is_infinite. + # + # Three-valued logic is tricky so let us reason this carefully. It + # would be nice to say that we just check is_zero/is_infinite in all + # args but we need to be careful about the case that one arg is zero + # and another is infinite like Mul(0, oo) or more importantly a case + # where it is not known if the arguments are zero or infinite like + # Mul(y, 1/x). If either y or x could be zero then there is a + # *possibility* that we have Mul(0, oo) which should give None for both + # is_zero and is_infinite. + # + # We keep track of whether we have seen a zero or infinity but we also + # need to keep track of whether we have *possibly* seen one which + # would be indicated by None. + # + # For each argument there is the possibility that is_zero might give + # True, False or None and likewise that is_infinite might give True, + # False or None, giving 9 combinations. The True cases for is_zero and + # is_infinite are mutually exclusive though so there are 3 main cases: + # + # - is_zero = True + # - is_infinite = True + # - is_zero and is_infinite are both either False or None + # + # At the end seen_zero and seen_infinite can be any of 9 combinations + # of True/False/None. Unless one is False though we cannot return + # anything except None: + # + # - is_zero=True needs seen_zero=True and seen_infinite=False + # - is_zero=False needs seen_zero=False + # - is_infinite=True needs seen_infinite=True and seen_zero=False + # - is_infinite=False needs seen_infinite=False + # - anything else gives both is_zero=None and is_infinite=None + # + # The loop only sets the flags to True or None and never back to False. + # Hence as soon as neither flag is False we exit early returning None. + # In particular as soon as we encounter a single arg that has + # is_zero=is_infinite=None we exit. This is a common case since it is + # the default assumptions for a Symbol and also the case for most + # expressions containing such a symbol. The early exit gives a big + # speedup for something like Mul(*symbols('x:1000')).is_zero. + # + seen_zero = seen_infinite = False + + for a in self.args: + if a.is_zero: + if seen_infinite is not False: + return None, None + seen_zero = True + elif a.is_infinite: + if seen_zero is not False: + return None, None + seen_infinite = True + else: + if seen_zero is False and a.is_zero is None: + if seen_infinite is not False: + return None, None + seen_zero = None + if seen_infinite is False and a.is_infinite is None: + if seen_zero is not False: + return None, None + seen_infinite = None + + return seen_zero, seen_infinite + + def _eval_is_zero(self): + # True iff any arg is zero and no arg is infinite but need to handle + # three valued logic carefully. + seen_zero, seen_infinite = self._eval_is_zero_infinite_helper() + + if seen_zero is False: + return False + elif seen_zero is True and seen_infinite is False: + return True + else: + return None + + def _eval_is_infinite(self): + # True iff any arg is infinite and no arg is zero but need to handle + # three valued logic carefully. + seen_zero, seen_infinite = self._eval_is_zero_infinite_helper() + + if seen_infinite is True and seen_zero is False: + return True + elif seen_infinite is False: + return False + else: + return None + + # We do not need to implement _eval_is_finite because the assumptions + # system can infer it from finite = not infinite. + + def _eval_is_rational(self): + r = _fuzzy_group((a.is_rational for a in self.args), quick_exit=True) + if r: + return r + elif r is False: + # All args except one are rational + if all(a.is_zero is False for a in self.args): + return False + + def _eval_is_algebraic(self): + r = _fuzzy_group((a.is_algebraic for a in self.args), quick_exit=True) + if r: + return r + elif r is False: + # All args except one are algebraic + if all(a.is_zero is False for a in self.args): + return False + + # without involving odd/even checks this code would suffice: + #_eval_is_integer = lambda self: _fuzzy_group( + # (a.is_integer for a in self.args), quick_exit=True) + def _eval_is_integer(self): + is_rational = self._eval_is_rational() + if is_rational is False: + return False + + numerators = [] + denominators = [] + unknown = False + for a in self.args: + hit = False + if a.is_integer: + if abs(a) is not S.One: + numerators.append(a) + elif a.is_Rational: + n, d = a.as_numer_denom() + if abs(n) is not S.One: + numerators.append(n) + if d is not S.One: + denominators.append(d) + elif a.is_Pow: + b, e = a.as_base_exp() + if not b.is_integer or not e.is_integer: + hit = unknown = True + if e.is_negative: + denominators.append(2 if a is S.Half else + Pow(a, S.NegativeOne)) + elif not hit: + # int b and pos int e: a = b**e is integer + assert not e.is_positive + # for rational self and e equal to zero: a = b**e is 1 + assert not e.is_zero + return # sign of e unknown -> self.is_integer unknown + else: + # x**2, 2**x, or x**y with x and y int-unknown -> unknown + return + else: + return + + if not denominators and not unknown: + return True + + allodd = lambda x: all(i.is_odd for i in x) + alleven = lambda x: all(i.is_even for i in x) + anyeven = lambda x: any(i.is_even for i in x) + + from .relational import is_gt + if not numerators and denominators and all( + is_gt(_, S.One) for _ in denominators): + return False + elif unknown: + return + elif allodd(numerators) and anyeven(denominators): + return False + elif anyeven(numerators) and denominators == [2]: + return True + elif alleven(numerators) and allodd(denominators + ) and (Mul(*denominators, evaluate=False) - 1 + ).is_positive: + return False + if len(denominators) == 1: + d = denominators[0] + if d.is_Integer and d.is_even: + # if minimal power of 2 in num vs den is not + # negative then we have an integer + if (Add(*[i.as_base_exp()[1] for i in + numerators if i.is_even]) - trailing(d.p) + ).is_nonnegative: + return True + if len(numerators) == 1: + n = numerators[0] + if n.is_Integer and n.is_even: + # if minimal power of 2 in den vs num is positive + # then we have have a non-integer + if (Add(*[i.as_base_exp()[1] for i in + denominators if i.is_even]) - trailing(n.p) + ).is_positive: + return False + + def _eval_is_polar(self): + has_polar = any(arg.is_polar for arg in self.args) + return has_polar and \ + all(arg.is_polar or arg.is_positive for arg in self.args) + + def _eval_is_extended_real(self): + return self._eval_real_imag(True) + + def _eval_real_imag(self, real): + zero = False + t_not_re_im = None + + for t in self.args: + if (t.is_complex or t.is_infinite) is False and t.is_extended_real is False: + return False + elif t.is_imaginary: # I + real = not real + elif t.is_extended_real: # 2 + if not zero: + z = t.is_zero + if not z and zero is False: + zero = z + elif z: + if all(a.is_finite for a in self.args): + return True + return + elif t.is_extended_real is False: + # symbolic or literal like `2 + I` or symbolic imaginary + if t_not_re_im: + return # complex terms might cancel + t_not_re_im = t + elif t.is_imaginary is False: # symbolic like `2` or `2 + I` + if t_not_re_im: + return # complex terms might cancel + t_not_re_im = t + else: + return + + if t_not_re_im: + if t_not_re_im.is_extended_real is False: + if real: # like 3 + return zero # 3*(smthng like 2 + I or i) is not real + if t_not_re_im.is_imaginary is False: # symbolic 2 or 2 + I + if not real: # like I + return zero # I*(smthng like 2 or 2 + I) is not real + elif zero is False: + return real # can't be trumped by 0 + elif real: + return real # doesn't matter what zero is + + def _eval_is_imaginary(self): + if all(a.is_zero is False and a.is_finite for a in self.args): + return self._eval_real_imag(False) + + def _eval_is_hermitian(self): + return self._eval_herm_antiherm(True) + + def _eval_is_antihermitian(self): + return self._eval_herm_antiherm(False) + + def _eval_herm_antiherm(self, herm): + for t in self.args: + if t.is_hermitian is None or t.is_antihermitian is None: + return + if t.is_hermitian: + continue + elif t.is_antihermitian: + herm = not herm + else: + return + + if herm is not False: + return herm + + is_zero = self._eval_is_zero() + if is_zero: + return True + elif is_zero is False: + return herm + + def _eval_is_irrational(self): + for t in self.args: + a = t.is_irrational + if a: + others = list(self.args) + others.remove(t) + if all((x.is_rational and fuzzy_not(x.is_zero)) is True for x in others): + return True + return + if a is None: + return + if all(x.is_real for x in self.args): + return False + + def _eval_is_extended_positive(self): + """Return True if self is positive, False if not, and None if it + cannot be determined. + + Explanation + =========== + + This algorithm is non-recursive and works by keeping track of the + sign which changes when a negative or nonpositive is encountered. + Whether a nonpositive or nonnegative is seen is also tracked since + the presence of these makes it impossible to return True, but + possible to return False if the end result is nonpositive. e.g. + + pos * neg * nonpositive -> pos or zero -> None is returned + pos * neg * nonnegative -> neg or zero -> False is returned + """ + return self._eval_pos_neg(1) + + def _eval_pos_neg(self, sign): + saw_NON = saw_NOT = False + for t in self.args: + if t.is_extended_positive: + continue + elif t.is_extended_negative: + sign = -sign + elif t.is_zero: + if all(a.is_finite for a in self.args): + return False + return + elif t.is_extended_nonpositive: + sign = -sign + saw_NON = True + elif t.is_extended_nonnegative: + saw_NON = True + # FIXME: is_positive/is_negative is False doesn't take account of + # Symbol('x', infinite=True, extended_real=True) which has + # e.g. is_positive is False but has uncertain sign. + elif t.is_positive is False: + sign = -sign + if saw_NOT: + return + saw_NOT = True + elif t.is_negative is False: + if saw_NOT: + return + saw_NOT = True + else: + return + if sign == 1 and saw_NON is False and saw_NOT is False: + return True + if sign < 0: + return False + + def _eval_is_extended_negative(self): + return self._eval_pos_neg(-1) + + def _eval_is_odd(self): + is_integer = self._eval_is_integer() + if is_integer is not True: + return is_integer + + from sympy.simplify.radsimp import fraction + n, d = fraction(self) + if d.is_Integer and d.is_even: + # if minimal power of 2 in num vs den is + # positive then we have an even number + if (Add(*[i.as_base_exp()[1] for i in + Mul.make_args(n) if i.is_even]) - trailing(d.p) + ).is_positive: + return False + return + r, acc = True, 1 + for t in self.args: + if abs(t) is S.One: + continue + if t.is_even: + return False + if r is False: + pass + elif acc != 1 and (acc + t).is_odd: + r = False + elif t.is_even is None: + r = None + acc = t + return r + + def _eval_is_even(self): + from sympy.simplify.radsimp import fraction + n, d = fraction(self) + if n.is_Integer and n.is_even: + # if minimal power of 2 in den vs num is not + # negative then this is not an integer and + # can't be even + if (Add(*[i.as_base_exp()[1] for i in + Mul.make_args(d) if i.is_even]) - trailing(n.p) + ).is_nonnegative: + return False + + def _eval_is_composite(self): + """ + Here we count the number of arguments that have a minimum value + greater than two. + If there are more than one of such a symbol then the result is composite. + Else, the result cannot be determined. + """ + number_of_args = 0 # count of symbols with minimum value greater than one + for arg in self.args: + if not (arg.is_integer and arg.is_positive): + return None + if (arg-1).is_positive: + number_of_args += 1 + + if number_of_args > 1: + return True + + def _eval_subs(self, old, new): + from sympy.functions.elementary.complexes import sign + from sympy.ntheory.factor_ import multiplicity + from sympy.simplify.powsimp import powdenest + from sympy.simplify.radsimp import fraction + + if not old.is_Mul: + return None + + # try keep replacement literal so -2*x doesn't replace 4*x + if old.args[0].is_Number and old.args[0] < 0: + if self.args[0].is_Number: + if self.args[0] < 0: + return self._subs(-old, -new) + return None + + def base_exp(a): + # if I and -1 are in a Mul, they get both end up with + # a -1 base (see issue 6421); all we want here are the + # true Pow or exp separated into base and exponent + from sympy.functions.elementary.exponential import exp + if a.is_Pow or isinstance(a, exp): + return a.as_base_exp() + return a, S.One + + def breakup(eq): + """break up powers of eq when treated as a Mul: + b**(Rational*e) -> b**e, Rational + commutatives come back as a dictionary {b**e: Rational} + noncommutatives come back as a list [(b**e, Rational)] + """ + + (c, nc) = (defaultdict(int), []) + for a in Mul.make_args(eq): + a = powdenest(a) + (b, e) = base_exp(a) + if e is not S.One: + (co, _) = e.as_coeff_mul() + b = Pow(b, e/co) + e = co + if a.is_commutative: + c[b] += e + else: + nc.append([b, e]) + return (c, nc) + + def rejoin(b, co): + """ + Put rational back with exponent; in general this is not ok, but + since we took it from the exponent for analysis, it's ok to put + it back. + """ + + (b, e) = base_exp(b) + return Pow(b, e*co) + + def ndiv(a, b): + """if b divides a in an extractive way (like 1/4 divides 1/2 + but not vice versa, and 2/5 does not divide 1/3) then return + the integer number of times it divides, else return 0. + """ + if not b.q % a.q or not a.q % b.q: + return int(a/b) + return 0 + + # give Muls in the denominator a chance to be changed (see issue 5651) + # rv will be the default return value + rv = None + n, d = fraction(self) + self2 = self + if d is not S.One: + self2 = n._subs(old, new)/d._subs(old, new) + if not self2.is_Mul: + return self2._subs(old, new) + if self2 != self: + rv = self2 + + # Now continue with regular substitution. + + # handle the leading coefficient and use it to decide if anything + # should even be started; we always know where to find the Rational + # so it's a quick test + + co_self = self2.args[0] + co_old = old.args[0] + co_xmul = None + if co_old.is_Rational and co_self.is_Rational: + # if coeffs are the same there will be no updating to do + # below after breakup() step; so skip (and keep co_xmul=None) + if co_old != co_self: + co_xmul = co_self.extract_multiplicatively(co_old) + elif co_old.is_Rational: + return rv + + # break self and old into factors + + (c, nc) = breakup(self2) + (old_c, old_nc) = breakup(old) + + # update the coefficients if we had an extraction + # e.g. if co_self were 2*(3/35*x)**2 and co_old = 3/5 + # then co_self in c is replaced by (3/5)**2 and co_residual + # is 2*(1/7)**2 + + if co_xmul and co_xmul.is_Rational and abs(co_old) != 1: + mult = S(multiplicity(abs(co_old), co_self)) + c.pop(co_self) + if co_old in c: + c[co_old] += mult + else: + c[co_old] = mult + co_residual = co_self/co_old**mult + else: + co_residual = 1 + + # do quick tests to see if we can't succeed + + ok = True + if len(old_nc) > len(nc): + # more non-commutative terms + ok = False + elif len(old_c) > len(c): + # more commutative terms + ok = False + elif {i[0] for i in old_nc}.difference({i[0] for i in nc}): + # unmatched non-commutative bases + ok = False + elif set(old_c).difference(set(c)): + # unmatched commutative terms + ok = False + elif any(sign(c[b]) != sign(old_c[b]) for b in old_c): + # differences in sign + ok = False + if not ok: + return rv + + if not old_c: + cdid = None + else: + rat = [] + for (b, old_e) in old_c.items(): + c_e = c[b] + rat.append(ndiv(c_e, old_e)) + if not rat[-1]: + return rv + cdid = min(rat) + + if not old_nc: + ncdid = None + for i in range(len(nc)): + nc[i] = rejoin(*nc[i]) + else: + ncdid = 0 # number of nc replacements we did + take = len(old_nc) # how much to look at each time + limit = cdid or S.Infinity # max number that we can take + failed = [] # failed terms will need subs if other terms pass + i = 0 + while limit and i + take <= len(nc): + hit = False + + # the bases must be equivalent in succession, and + # the powers must be extractively compatible on the + # first and last factor but equal in between. + + rat = [] + for j in range(take): + if nc[i + j][0] != old_nc[j][0]: + break + elif j == 0: + rat.append(ndiv(nc[i + j][1], old_nc[j][1])) + elif j == take - 1: + rat.append(ndiv(nc[i + j][1], old_nc[j][1])) + elif nc[i + j][1] != old_nc[j][1]: + break + else: + rat.append(1) + j += 1 + else: + ndo = min(rat) + if ndo: + if take == 1: + if cdid: + ndo = min(cdid, ndo) + nc[i] = Pow(new, ndo)*rejoin(nc[i][0], + nc[i][1] - ndo*old_nc[0][1]) + else: + ndo = 1 + + # the left residual + + l = rejoin(nc[i][0], nc[i][1] - ndo* + old_nc[0][1]) + + # eliminate all middle terms + + mid = new + + # the right residual (which may be the same as the middle if take == 2) + + ir = i + take - 1 + r = (nc[ir][0], nc[ir][1] - ndo* + old_nc[-1][1]) + if r[1]: + if i + take < len(nc): + nc[i:i + take] = [l*mid, r] + else: + r = rejoin(*r) + nc[i:i + take] = [l*mid*r] + else: + + # there was nothing left on the right + + nc[i:i + take] = [l*mid] + + limit -= ndo + ncdid += ndo + hit = True + if not hit: + + # do the subs on this failing factor + + failed.append(i) + i += 1 + else: + + if not ncdid: + return rv + + # although we didn't fail, certain nc terms may have + # failed so we rebuild them after attempting a partial + # subs on them + + failed.extend(range(i, len(nc))) + for i in failed: + nc[i] = rejoin(*nc[i]).subs(old, new) + + # rebuild the expression + + if cdid is None: + do = ncdid + elif ncdid is None: + do = cdid + else: + do = min(ncdid, cdid) + + margs = [] + for b in c: + if b in old_c: + + # calculate the new exponent + + e = c[b] - old_c[b]*do + margs.append(rejoin(b, e)) + else: + margs.append(rejoin(b.subs(old, new), c[b])) + if cdid and not ncdid: + + # in case we are replacing commutative with non-commutative, + # we want the new term to come at the front just like the + # rest of this routine + + margs = [Pow(new, cdid)] + margs + return co_residual*self2.func(*margs)*self2.func(*nc) + + def _eval_nseries(self, x, n, logx, cdir=0): + from .function import PoleError + from sympy.functions.elementary.integers import ceiling + from sympy.series.order import Order + + def coeff_exp(term, x): + lt = term.as_coeff_exponent(x) + if lt[0].has(x): + try: + lt = term.leadterm(x) + except ValueError: + return term, S.Zero + return lt + + ords = [] + + try: + for t in self.args: + coeff, exp = t.leadterm(x) + if not coeff.has(x): + ords.append((t, exp)) + else: + raise ValueError + + n0 = sum(t[1] for t in ords if t[1].is_number) + facs = [] + for t, m in ords: + n1 = ceiling(n - n0 + (m if m.is_number else 0)) + s = t.nseries(x, n=n1, logx=logx, cdir=cdir) + ns = s.getn() + if ns is not None: + if ns < n1: # less than expected + n -= n1 - ns # reduce n + facs.append(s) + + except (ValueError, NotImplementedError, TypeError, PoleError): + # XXX: Catching so many generic exceptions around a large block of + # code will mask bugs. Whatever purpose catching these exceptions + # serves should be handled in a different way. + n0 = sympify(sum(t[1] for t in ords if t[1].is_number)) + if n0.is_nonnegative: + n0 = S.Zero + facs = [t.nseries(x, n=ceiling(n-n0), logx=logx, cdir=cdir) for t in self.args] + from sympy.simplify.powsimp import powsimp + res = powsimp(self.func(*facs).expand(), combine='exp', deep=True) + if res.has(Order): + res += Order(x**n, x) + return res + + res = S.Zero + ords2 = [Add.make_args(factor) for factor in facs] + + for fac in product(*ords2): + ords3 = [coeff_exp(term, x) for term in fac] + coeffs, powers = zip(*ords3) + power = sum(powers) + if (power - n).is_negative: + res += Mul(*coeffs)*(x**power) + + def max_degree(e, x): + if e is x: + return S.One + if e.is_Atom: + return S.Zero + if e.is_Add: + return max(max_degree(a, x) for a in e.args) + if e.is_Mul: + return Add(*[max_degree(a, x) for a in e.args]) + if e.is_Pow: + return max_degree(e.base, x)*e.exp + return S.Zero + + if self.is_polynomial(x): + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import degree + try: + if max_degree(self, x) >= n or degree(self, x) != degree(res, x): + res += Order(x**n, x) + except PolynomialError: + pass + else: + return res + + if res != self: + if (self - res).subs(x, 0) == S.Zero and n > 0: + lt = self._eval_as_leading_term(x, logx=logx, cdir=cdir) + if lt == S.Zero: + return res + res += Order(x**n, x) + return res + + def _eval_as_leading_term(self, x, logx, cdir): + return self.func(*[t.as_leading_term(x, logx=logx, cdir=cdir) for t in self.args]) + + def _eval_conjugate(self): + return self.func(*[t.conjugate() for t in self.args]) + + def _eval_transpose(self): + return self.func(*[t.transpose() for t in self.args[::-1]]) + + def _eval_adjoint(self): + return self.func(*[t.adjoint() for t in self.args[::-1]]) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import sqrt + >>> (-3*sqrt(2)*(2 - 2*sqrt(2))).as_content_primitive() + (6, -sqrt(2)*(1 - sqrt(2))) + + See docstring of Expr.as_content_primitive for more examples. + """ + + coef = S.One + args = [] + for a in self.args: + c, p = a.as_content_primitive(radical=radical, clear=clear) + coef *= c + if p is not S.One: + args.append(p) + # don't use self._from_args here to reconstruct args + # since there may be identical args now that should be combined + # e.g. (2+2*x)*(3+3*x) should be (6, (1 + x)**2) not (6, (1+x)*(1+x)) + return coef, self.func(*args) + + def as_ordered_factors(self, order=None): + """Transform an expression into an ordered list of factors. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x, y + + >>> (2*x*y*sin(x)*cos(x)).as_ordered_factors() + [2, x, y, sin(x), cos(x)] + + """ + cpart, ncpart = self.args_cnc() + cpart.sort(key=lambda expr: expr.sort_key(order=order)) + return cpart + ncpart + + @property + def _sorted_args(self): + return tuple(self.as_ordered_factors()) + +mul = AssocOpDispatcher('mul') + + +def prod(a, start=1): + """Return product of elements of a. Start with int 1 so if only + ints are included then an int result is returned. + + Examples + ======== + + >>> from sympy import prod, S + >>> prod(range(3)) + 0 + >>> type(_) is int + True + >>> prod([S(2), 3]) + 6 + >>> _.is_Integer + True + + You can start the product at something other than 1: + + >>> prod([1, 2], 3) + 6 + + """ + return reduce(operator.mul, a, start) + + +def _keep_coeff(coeff, factors, clear=True, sign=False): + """Return ``coeff*factors`` unevaluated if necessary. + + If ``clear`` is False, do not keep the coefficient as a factor + if it can be distributed on a single factor such that one or + more terms will still have integer coefficients. + + If ``sign`` is True, allow a coefficient of -1 to remain factored out. + + Examples + ======== + + >>> from sympy.core.mul import _keep_coeff + >>> from sympy.abc import x, y + >>> from sympy import S + + >>> _keep_coeff(S.Half, x + 2) + (x + 2)/2 + >>> _keep_coeff(S.Half, x + 2, clear=False) + x/2 + 1 + >>> _keep_coeff(S.Half, (x + 2)*y, clear=False) + y*(x + 2)/2 + >>> _keep_coeff(S(-1), x + y) + -x - y + >>> _keep_coeff(S(-1), x + y, sign=True) + -(x + y) + """ + if not coeff.is_Number: + if factors.is_Number: + factors, coeff = coeff, factors + else: + return coeff*factors + if factors is S.One: + return coeff + if coeff is S.One: + return factors + elif coeff is S.NegativeOne and not sign: + return -factors + elif factors.is_Add: + if not clear and coeff.is_Rational and coeff.q != 1: + args = [i.as_coeff_Mul() for i in factors.args] + args = [(_keep_coeff(c, coeff), m) for c, m in args] + if any(c.is_Integer for c, _ in args): + return Add._from_args([Mul._from_args( + i[1:] if i[0] == 1 else i) for i in args]) + return Mul(coeff, factors, evaluate=False) + elif factors.is_Mul: + margs = list(factors.args) + if margs[0].is_Number: + margs[0] *= coeff + if margs[0] == 1: + margs.pop(0) + else: + margs.insert(0, coeff) + return Mul._from_args(margs) + else: + m = coeff*factors + if m.is_Number and not factors.is_Number: + m = Mul._from_args((coeff, factors)) + return m + +def expand_2arg(e): + def do(e): + if e.is_Mul: + c, r = e.as_coeff_Mul() + if c.is_Number and r.is_Add: + return _unevaluated_Add(*[c*ri for ri in r.args]) + return e + return bottom_up(e, do) + + +from .numbers import Rational +from .power import Pow +from .add import Add, _unevaluated_Add diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/multidimensional.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/multidimensional.py new file mode 100644 index 0000000000000000000000000000000000000000..133e0ab6cba6a87c627feb6f6034a6daed1128c5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/multidimensional.py @@ -0,0 +1,131 @@ +""" +Provides functionality for multidimensional usage of scalar-functions. + +Read the vectorize docstring for more details. +""" + +from functools import wraps + + +def apply_on_element(f, args, kwargs, n): + """ + Returns a structure with the same dimension as the specified argument, + where each basic element is replaced by the function f applied on it. All + other arguments stay the same. + """ + # Get the specified argument. + if isinstance(n, int): + structure = args[n] + is_arg = True + elif isinstance(n, str): + structure = kwargs[n] + is_arg = False + + # Define reduced function that is only dependent on the specified argument. + def f_reduced(x): + if hasattr(x, "__iter__"): + return list(map(f_reduced, x)) + else: + if is_arg: + args[n] = x + else: + kwargs[n] = x + return f(*args, **kwargs) + + # f_reduced will call itself recursively so that in the end f is applied to + # all basic elements. + return list(map(f_reduced, structure)) + + +def iter_copy(structure): + """ + Returns a copy of an iterable object (also copying all embedded iterables). + """ + return [iter_copy(i) if hasattr(i, "__iter__") else i for i in structure] + + +def structure_copy(structure): + """ + Returns a copy of the given structure (numpy-array, list, iterable, ..). + """ + if hasattr(structure, "copy"): + return structure.copy() + return iter_copy(structure) + + +class vectorize: + """ + Generalizes a function taking scalars to accept multidimensional arguments. + + Examples + ======== + + >>> from sympy import vectorize, diff, sin, symbols, Function + >>> x, y, z = symbols('x y z') + >>> f, g, h = list(map(Function, 'fgh')) + + >>> @vectorize(0) + ... def vsin(x): + ... return sin(x) + + >>> vsin([1, x, y]) + [sin(1), sin(x), sin(y)] + + >>> @vectorize(0, 1) + ... def vdiff(f, y): + ... return diff(f, y) + + >>> vdiff([f(x, y, z), g(x, y, z), h(x, y, z)], [x, y, z]) + [[Derivative(f(x, y, z), x), Derivative(f(x, y, z), y), Derivative(f(x, y, z), z)], [Derivative(g(x, y, z), x), Derivative(g(x, y, z), y), Derivative(g(x, y, z), z)], [Derivative(h(x, y, z), x), Derivative(h(x, y, z), y), Derivative(h(x, y, z), z)]] + """ + def __init__(self, *mdargs): + """ + The given numbers and strings characterize the arguments that will be + treated as data structures, where the decorated function will be applied + to every single element. + If no argument is given, everything is treated multidimensional. + """ + for a in mdargs: + if not isinstance(a, (int, str)): + raise TypeError("a is of invalid type") + self.mdargs = mdargs + + def __call__(self, f): + """ + Returns a wrapper for the one-dimensional function that can handle + multidimensional arguments. + """ + @wraps(f) + def wrapper(*args, **kwargs): + # Get arguments that should be treated multidimensional + if self.mdargs: + mdargs = self.mdargs + else: + mdargs = range(len(args)) + kwargs.keys() + + arglength = len(args) + + for n in mdargs: + if isinstance(n, int): + if n >= arglength: + continue + entry = args[n] + is_arg = True + elif isinstance(n, str): + try: + entry = kwargs[n] + except KeyError: + continue + is_arg = False + if hasattr(entry, "__iter__"): + # Create now a copy of the given array and manipulate then + # the entries directly. + if is_arg: + args = list(args) + args[n] = structure_copy(entry) + else: + kwargs[n] = structure_copy(entry) + result = apply_on_element(wrapper, args, kwargs, n) + return result + return f(*args, **kwargs) + return wrapper diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/numbers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..9fa13fbb96aa25a8e60e048c0147a5e660804ccc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/numbers.py @@ -0,0 +1,4482 @@ +from __future__ import annotations + +from typing import overload + +import numbers +import decimal +import fractions +import math + +from .containers import Tuple +from .sympify import (SympifyError, _sympy_converter, sympify, _convert_numpy_types, + _sympify, _is_numpy_instance) +from .singleton import S, Singleton +from .basic import Basic +from .expr import Expr, AtomicExpr +from .evalf import pure_complex +from .cache import cacheit, clear_cache +from .decorators import _sympifyit +from .intfunc import num_digits, igcd, ilcm, mod_inverse, integer_nthroot +from .logic import fuzzy_not +from .kind import NumberKind +from .sorting import ordered +from sympy.external.gmpy import SYMPY_INTS, gmpy, flint +from sympy.multipledispatch import dispatch +import mpmath +import mpmath.libmp as mlib +from mpmath.libmp import bitcount, round_nearest as rnd +from mpmath.libmp.backend import MPZ +from mpmath.libmp import mpf_pow, mpf_pi, mpf_e, phi_fixed +from mpmath.ctx_mp_python import mpnumeric +from mpmath.libmp.libmpf import ( + finf as _mpf_inf, fninf as _mpf_ninf, + fnan as _mpf_nan, fzero, _normalize as mpf_normalize, + prec_to_dps, dps_to_prec) +from sympy.utilities.misc import debug +from sympy.utilities.exceptions import sympy_deprecation_warning +from .parameters import global_parameters + +_LOG2 = math.log(2) + + +def comp(z1, z2, tol=None): + r"""Return a bool indicating whether the error between z1 and z2 + is $\le$ ``tol``. + + Examples + ======== + + If ``tol`` is ``None`` then ``True`` will be returned if + :math:`|z1 - z2|\times 10^p \le 5` where $p$ is minimum value of the + decimal precision of each value. + + >>> from sympy import comp, pi + >>> pi4 = pi.n(4); pi4 + 3.142 + >>> comp(_, 3.142) + True + >>> comp(pi4, 3.141) + False + >>> comp(pi4, 3.143) + False + + A comparison of strings will be made + if ``z1`` is a Number and ``z2`` is a string or ``tol`` is ''. + + >>> comp(pi4, 3.1415) + True + >>> comp(pi4, 3.1415, '') + False + + When ``tol`` is provided and $z2$ is non-zero and + :math:`|z1| > 1` the error is normalized by :math:`|z1|`: + + >>> abs(pi4 - 3.14)/pi4 + 0.000509791731426756 + >>> comp(pi4, 3.14, .001) # difference less than 0.1% + True + >>> comp(pi4, 3.14, .0005) # difference less than 0.1% + False + + When :math:`|z1| \le 1` the absolute error is used: + + >>> 1/pi4 + 0.3183 + >>> abs(1/pi4 - 0.3183)/(1/pi4) + 3.07371499106316e-5 + >>> abs(1/pi4 - 0.3183) + 9.78393554684764e-6 + >>> comp(1/pi4, 0.3183, 1e-5) + True + + To see if the absolute error between ``z1`` and ``z2`` is less + than or equal to ``tol``, call this as ``comp(z1 - z2, 0, tol)`` + or ``comp(z1 - z2, tol=tol)``: + + >>> abs(pi4 - 3.14) + 0.00160156249999988 + >>> comp(pi4 - 3.14, 0, .002) + True + >>> comp(pi4 - 3.14, 0, .001) + False + """ + if isinstance(z2, str): + if not pure_complex(z1, or_real=True): + raise ValueError('when z2 is a str z1 must be a Number') + return str(z1) == z2 + if not z1: + z1, z2 = z2, z1 + if not z1: + return True + if not tol: + a, b = z1, z2 + if tol == '': + return str(a) == str(b) + if tol is None: + a, b = sympify(a), sympify(b) + if not all(i.is_number for i in (a, b)): + raise ValueError('expecting 2 numbers') + fa = a.atoms(Float) + fb = b.atoms(Float) + if not fa and not fb: + # no floats -- compare exactly + return a == b + # get a to be pure_complex + for _ in range(2): + ca = pure_complex(a, or_real=True) + if not ca: + if fa: + a = a.n(prec_to_dps(min(i._prec for i in fa))) + ca = pure_complex(a, or_real=True) + break + else: + fa, fb = fb, fa + a, b = b, a + cb = pure_complex(b) + if not cb and fb: + b = b.n(prec_to_dps(min(i._prec for i in fb))) + cb = pure_complex(b, or_real=True) + if ca and cb and (ca[1] or cb[1]): + return all(comp(i, j) for i, j in zip(ca, cb)) + tol = 10**prec_to_dps(min(a._prec, getattr(b, '_prec', a._prec))) + return int(abs(a - b)*tol) <= 5 + diff = abs(z1 - z2) + az1 = abs(z1) + if z2 and az1 > 1: + return diff/az1 <= tol + else: + return diff <= tol + + +def mpf_norm(mpf, prec): + """Return the mpf tuple normalized appropriately for the indicated + precision after doing a check to see if zero should be returned or + not when the mantissa is 0. ``mpf_normlize`` always assumes that this + is zero, but it may not be since the mantissa for mpf's values "+inf", + "-inf" and "nan" have a mantissa of zero, too. + + Note: this is not intended to validate a given mpf tuple, so sending + mpf tuples that were not created by mpmath may produce bad results. This + is only a wrapper to ``mpf_normalize`` which provides the check for non- + zero mpfs that have a 0 for the mantissa. + """ + sign, man, expt, bc = mpf + if not man: + # hack for mpf_normalize which does not do this; + # it assumes that if man is zero the result is 0 + # (see issue 6639) + if not bc: + return fzero + else: + # don't change anything; this should already + # be a well formed mpf tuple + return mpf + + # Necessary if mpmath is using the gmpy backend + from mpmath.libmp.backend import MPZ + rv = mpf_normalize(sign, MPZ(man), expt, bc, prec, rnd) + return rv + +# TODO: we should use the warnings module +_errdict = {"divide": False} + + +def seterr(divide=False): + """ + Should SymPy raise an exception on 0/0 or return a nan? + + divide == True .... raise an exception + divide == False ... return nan + """ + if _errdict["divide"] != divide: + clear_cache() + _errdict["divide"] = divide + + +def _as_integer_ratio(p): + neg_pow, man, expt, _ = getattr(p, '_mpf_', mpmath.mpf(p)._mpf_) + p = [1, -1][neg_pow % 2]*man + if expt < 0: + q = 2**-expt + else: + q = 1 + p *= 2**expt + return int(p), int(q) + + +def _decimal_to_Rational_prec(dec): + """Convert an ordinary decimal instance to a Rational.""" + if not dec.is_finite(): + raise TypeError("dec must be finite, got %s." % dec) + s, d, e = dec.as_tuple() + prec = len(d) + if e >= 0: # it's an integer + rv = Integer(int(dec)) + else: + s = (-1)**s + d = sum(di*10**i for i, di in enumerate(reversed(d))) + rv = Rational(s*d, 10**-e) + return rv, prec + +_dig = str.maketrans(dict.fromkeys('1234567890')) + +def _literal_float(s): + """return True if s is space-trimmed number literal else False + + Python allows underscore as digit separators: there must be a + digit on each side. So neither a leading underscore nor a + double underscore are valid as part of a number. A number does + not have to precede the decimal point, but there must be a + digit before the optional "e" or "E" that begins the signs + exponent of the number which must be an integer, perhaps with + underscore separators. + + SymPy allows space as a separator; if the calling routine replaces + them with underscores then the same semantics will be enforced + for them as for underscores: there can only be 1 *between* digits. + + We don't check for error from float(s) because we don't know + whether s is malicious or not. A regex for this could maybe + be written but will it be understood by most who read it? + """ + # mantissa and exponent + parts = s.split('e') + if len(parts) > 2: + return False + if len(parts) == 2: + m, e = parts + if e.startswith(tuple('+-')): + e = e[1:] + if not e: + return False + else: + m, e = s, '1' + # integer and fraction of mantissa + parts = m.split('.') + if len(parts) > 2: + return False + elif len(parts) == 2: + i, f = parts + else: + i, f = m, '1' + if not i and not f: + return False + if i and i[0] in '+-': + i = i[1:] + if not i: # -.3e4 -> -0.3e4 + i = '1' + f = f or '1' + # check that all groups contain only digits and are not null + for n in (i, f, e): + for g in n.split('_'): + if not g or g.translate(_dig): + return False + return True + +# (a,b) -> gcd(a,b) + +# TODO caching with decorator, but not to degrade performance + + +class Number(AtomicExpr): + """Represents atomic numbers in SymPy. + + Explanation + =========== + + Floating point numbers are represented by the Float class. + Rational numbers (of any size) are represented by the Rational class. + Integer numbers (of any size) are represented by the Integer class. + Float and Rational are subclasses of Number; Integer is a subclass + of Rational. + + For example, ``2/3`` is represented as ``Rational(2, 3)`` which is + a different object from the floating point number obtained with + Python division ``2/3``. Even for numbers that are exactly + represented in binary, there is a difference between how two forms, + such as ``Rational(1, 2)`` and ``Float(0.5)``, are used in SymPy. + The rational form is to be preferred in symbolic computations. + + Other kinds of numbers, such as algebraic numbers ``sqrt(2)`` or + complex numbers ``3 + 4*I``, are not instances of Number class as + they are not atomic. + + See Also + ======== + + Float, Integer, Rational + """ + is_commutative = True + is_number = True + is_Number = True + + __slots__ = () + + # Used to make max(x._prec, y._prec) return x._prec when only x is a float + _prec = -1 + + kind = NumberKind + + def __new__(cls, *obj): + if len(obj) == 1: + obj = obj[0] + + if isinstance(obj, Number): + return obj + if isinstance(obj, SYMPY_INTS): + return Integer(obj) + if isinstance(obj, tuple) and len(obj) == 2: + return Rational(*obj) + if isinstance(obj, (float, mpmath.mpf, decimal.Decimal)): + return Float(obj) + if isinstance(obj, str): + _obj = obj.lower() # float('INF') == float('inf') + if _obj == 'nan': + return S.NaN + elif _obj == 'inf': + return S.Infinity + elif _obj == '+inf': + return S.Infinity + elif _obj == '-inf': + return S.NegativeInfinity + val = sympify(obj) + if isinstance(val, Number): + return val + else: + raise ValueError('String "%s" does not denote a Number' % obj) + msg = "expected str|int|long|float|Decimal|Number object but got %r" + raise TypeError(msg % type(obj).__name__) + + def could_extract_minus_sign(self): + return bool(self.is_extended_negative) + + def invert(self, other, *gens, **args): + from sympy.polys.polytools import invert + if getattr(other, 'is_number', True): + return mod_inverse(self, other) + return invert(self, other, *gens, **args) + + def __divmod__(self, other): + from sympy.functions.elementary.complexes import sign + + try: + other = Number(other) + if self.is_infinite or S.NaN in (self, other): + return (S.NaN, S.NaN) + except TypeError: + return NotImplemented + if not other: + raise ZeroDivisionError('modulo by zero') + if self.is_Integer and other.is_Integer: + return Tuple(*divmod(self.p, other.p)) + elif isinstance(other, Float): + rat = self/Rational(other) + else: + rat = self/other + if other.is_finite: + w = int(rat) if rat >= 0 else int(rat) - 1 + r = self - other*w + if r == Float(other): + w += 1 + r = 0 + if isinstance(self, Float) or isinstance(other, Float): + r = Float(r) # in case w or r is 0 + else: + w = 0 if not self or (sign(self) == sign(other)) else -1 + r = other if w else self + return Tuple(w, r) + + def __rdivmod__(self, other): + try: + other = Number(other) + except TypeError: + return NotImplemented + return divmod(other, self) + + def _as_mpf_val(self, prec): + """Evaluation of mpf tuple accurate to at least prec bits.""" + raise NotImplementedError('%s needs ._as_mpf_val() method' % + (self.__class__.__name__)) + + def _eval_evalf(self, prec): + return Float._new(self._as_mpf_val(prec), prec) + + def _as_mpf_op(self, prec): + prec = max(prec, self._prec) + return self._as_mpf_val(prec), prec + + def __float__(self): + return mlib.to_float(self._as_mpf_val(53)) + + def floor(self): + raise NotImplementedError('%s needs .floor() method' % + (self.__class__.__name__)) + + def ceiling(self): + raise NotImplementedError('%s needs .ceiling() method' % + (self.__class__.__name__)) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def _eval_conjugate(self): + return self + + def _eval_order(self, *symbols): + from sympy.series.order import Order + # Order(5, x, y) -> Order(1,x,y) + return Order(S.One, *symbols) + + def _eval_subs(self, old, new): + if old == -self: + return -new + return self # there is no other possibility + + @classmethod + def class_key(cls): + return 1, 0, 'Number' + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (0, ()), (), self + + def __neg__(self) -> Number: + raise NotImplementedError + + @overload + def __add__(self, other: Number | int | float) -> Number: ... + @overload + def __add__(self, other: Expr) -> Expr: ... + + @_sympifyit('other', NotImplemented) + def __add__(self, other) -> Expr: + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + return S.Infinity + elif other is S.NegativeInfinity: + return S.NegativeInfinity + return AtomicExpr.__add__(self, other) + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + return S.NegativeInfinity + elif other is S.NegativeInfinity: + return S.Infinity + return AtomicExpr.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + if self.is_zero: + return S.NaN + elif self.is_positive: + return S.Infinity + else: + return S.NegativeInfinity + elif other is S.NegativeInfinity: + if self.is_zero: + return S.NaN + elif self.is_positive: + return S.NegativeInfinity + else: + return S.Infinity + elif isinstance(other, Tuple): + return NotImplemented + return AtomicExpr.__mul__(self, other) + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other in (S.Infinity, S.NegativeInfinity): + return S.Zero + return AtomicExpr.__truediv__(self, other) + + def __eq__(self, other): + raise NotImplementedError('%s needs .__eq__() method' % + (self.__class__.__name__)) + + def __ne__(self, other): + raise NotImplementedError('%s needs .__ne__() method' % + (self.__class__.__name__)) + + def __lt__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s < %s" % (self, other)) + raise NotImplementedError('%s needs .__lt__() method' % + (self.__class__.__name__)) + + def __le__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s <= %s" % (self, other)) + raise NotImplementedError('%s needs .__le__() method' % + (self.__class__.__name__)) + + def __gt__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s > %s" % (self, other)) + return _sympify(other).__lt__(self) + + def __ge__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s >= %s" % (self, other)) + return _sympify(other).__le__(self) + + def __hash__(self): + return super().__hash__() + + def is_constant(self, *wrt, **flags): + return True + + def as_coeff_mul(self, *deps, rational=True, **kwargs): + # a -> c*t + if self.is_Rational or not rational: + return self, () + elif self.is_negative: + return S.NegativeOne, (-self,) + return S.One, (self,) + + def as_coeff_add(self, *deps): + # a -> c + t + if self.is_Rational: + return self, () + return S.Zero, (self,) + + def as_coeff_Mul(self, rational=False): + """Efficiently extract the coefficient of a product.""" + if not rational: + return self, S.One + return S.One, self + + def as_coeff_Add(self, rational=False): + """Efficiently extract the coefficient of a summation.""" + if not rational: + return self, S.Zero + return S.Zero, self + + def gcd(self, other): + """Compute GCD of `self` and `other`. """ + from sympy.polys.polytools import gcd + return gcd(self, other) + + def lcm(self, other): + """Compute LCM of `self` and `other`. """ + from sympy.polys.polytools import lcm + return lcm(self, other) + + def cofactors(self, other): + """Compute GCD and cofactors of `self` and `other`. """ + from sympy.polys.polytools import cofactors + return cofactors(self, other) + + +class Float(Number): + """Represent a floating-point number of arbitrary precision. + + Examples + ======== + + >>> from sympy import Float + >>> Float(3.5) + 3.50000000000000 + >>> Float(3) + 3.00000000000000 + + Creating Floats from strings (and Python ``int`` and ``long`` + types) will give a minimum precision of 15 digits, but the + precision will automatically increase to capture all digits + entered. + + >>> Float(1) + 1.00000000000000 + >>> Float(10**20) + 100000000000000000000. + >>> Float('1e20') + 100000000000000000000. + + However, *floating-point* numbers (Python ``float`` types) retain + only 15 digits of precision: + + >>> Float(1e20) + 1.00000000000000e+20 + >>> Float(1.23456789123456789) + 1.23456789123457 + + It may be preferable to enter high-precision decimal numbers + as strings: + + >>> Float('1.23456789123456789') + 1.23456789123456789 + + The desired number of digits can also be specified: + + >>> Float('1e-3', 3) + 0.00100 + >>> Float(100, 4) + 100.0 + + Float can automatically count significant figures if a null string + is sent for the precision; spaces or underscores are also allowed. (Auto- + counting is only allowed for strings, ints and longs). + + >>> Float('123 456 789.123_456', '') + 123456789.123456 + >>> Float('12e-3', '') + 0.012 + >>> Float(3, '') + 3. + + If a number is written in scientific notation, only the digits before the + exponent are considered significant if a decimal appears, otherwise the + "e" signifies only how to move the decimal: + + >>> Float('60.e2', '') # 2 digits significant + 6.0e+3 + >>> Float('60e2', '') # 4 digits significant + 6000. + >>> Float('600e-2', '') # 3 digits significant + 6.00 + + Notes + ===== + + Floats are inexact by their nature unless their value is a binary-exact + value. + + >>> approx, exact = Float(.1, 1), Float(.125, 1) + + For calculation purposes, evalf needs to be able to change the precision + but this will not increase the accuracy of the inexact value. The + following is the most accurate 5-digit approximation of a value of 0.1 + that had only 1 digit of precision: + + >>> approx.evalf(5) + 0.099609 + + By contrast, 0.125 is exact in binary (as it is in base 10) and so it + can be passed to Float or evalf to obtain an arbitrary precision with + matching accuracy: + + >>> Float(exact, 5) + 0.12500 + >>> exact.evalf(20) + 0.12500000000000000000 + + Trying to make a high-precision Float from a float is not disallowed, + but one must keep in mind that the *underlying float* (not the apparent + decimal value) is being obtained with high precision. For example, 0.3 + does not have a finite binary representation. The closest rational is + the fraction 5404319552844595/2**54. So if you try to obtain a Float of + 0.3 to 20 digits of precision you will not see the same thing as 0.3 + followed by 19 zeros: + + >>> Float(0.3, 20) + 0.29999999999999998890 + + If you want a 20-digit value of the decimal 0.3 (not the floating point + approximation of 0.3) you should send the 0.3 as a string. The underlying + representation is still binary but a higher precision than Python's float + is used: + + >>> Float('0.3', 20) + 0.30000000000000000000 + + Although you can increase the precision of an existing Float using Float + it will not increase the accuracy -- the underlying value is not changed: + + >>> def show(f): # binary rep of Float + ... from sympy import Mul, Pow + ... s, m, e, b = f._mpf_ + ... v = Mul(int(m), Pow(2, int(e), evaluate=False), evaluate=False) + ... print('%s at prec=%s' % (v, f._prec)) + ... + >>> t = Float('0.3', 3) + >>> show(t) + 4915/2**14 at prec=13 + >>> show(Float(t, 20)) # higher prec, not higher accuracy + 4915/2**14 at prec=70 + >>> show(Float(t, 2)) # lower prec + 307/2**10 at prec=10 + + The same thing happens when evalf is used on a Float: + + >>> show(t.evalf(20)) + 4915/2**14 at prec=70 + >>> show(t.evalf(2)) + 307/2**10 at prec=10 + + Finally, Floats can be instantiated with an mpf tuple (n, c, p) to + produce the number (-1)**n*c*2**p: + + >>> n, c, p = 1, 5, 0 + >>> (-1)**n*c*2**p + -5 + >>> Float((1, 5, 0)) + -5.00000000000000 + + An actual mpf tuple also contains the number of bits in c as the last + element of the tuple: + + >>> _._mpf_ + (1, 5, 0, 3) + + This is not needed for instantiation and is not the same thing as the + precision. The mpf tuple and the precision are two separate quantities + that Float tracks. + + In SymPy, a Float is a number that can be computed with arbitrary + precision. Although floating point 'inf' and 'nan' are not such + numbers, Float can create these numbers: + + >>> Float('-inf') + -oo + >>> _.is_Float + False + + Zero in Float only has a single value. Values are not separate for + positive and negative zeroes. + """ + __slots__ = ('_mpf_', '_prec') + + _mpf_: tuple[int, int, int, int] + + # A Float, though rational in form, does not behave like + # a rational in all Python expressions so we deal with + # exceptions (where we want to deal with the rational + # form of the Float as a rational) at the source rather + # than assigning a mathematically loaded category of 'rational' + is_rational = None + is_irrational = None + is_number = True + + is_real = True + is_extended_real = True + + is_Float = True + + _remove_non_digits = str.maketrans(dict.fromkeys("-+_.")) + + def __new__(cls, num, dps=None, precision=None): + if dps is not None and precision is not None: + raise ValueError('Both decimal and binary precision supplied. ' + 'Supply only one. ') + + if isinstance(num, str): + _num = num = num.strip() # Python ignores leading and trailing space + num = num.replace(' ', '_').lower() # Float treats spaces as digit sep; E -> e + if num.startswith('.') and len(num) > 1: + num = '0' + num + elif num.startswith('-.') and len(num) > 2: + num = '-0.' + num[2:] + elif num in ('inf', '+inf'): + return S.Infinity + elif num == '-inf': + return S.NegativeInfinity + elif num == 'nan': + return S.NaN + elif not _literal_float(num): + raise ValueError('string-float not recognized: %s' % _num) + elif isinstance(num, float) and num == 0: + num = '0' + elif isinstance(num, float) and num == float('inf'): + return S.Infinity + elif isinstance(num, float) and num == float('-inf'): + return S.NegativeInfinity + elif isinstance(num, float) and math.isnan(num): + return S.NaN + elif isinstance(num, (SYMPY_INTS, Integer)): + num = str(num) + elif num is S.Infinity: + return num + elif num is S.NegativeInfinity: + return num + elif num is S.NaN: + return num + elif _is_numpy_instance(num): # support for numpy datatypes + num = _convert_numpy_types(num) + elif isinstance(num, mpmath.mpf): + if precision is None: + if dps is None: + precision = num.context.prec + num = num._mpf_ + + if dps is None and precision is None: + dps = 15 + if isinstance(num, Float): + return num + if isinstance(num, str): + try: + Num = decimal.Decimal(num) + except decimal.InvalidOperation: + pass + else: + isint = '.' not in num + num, dps = _decimal_to_Rational_prec(Num) + if num.is_Integer and isint: + # 12e3 is shorthand for int, not float; + # 12.e3 would be the float version + dps = max(dps, num_digits(num)) + dps = max(15, dps) + precision = dps_to_prec(dps) + elif precision == '' and dps is None or precision is None and dps == '': + if not isinstance(num, str): + raise ValueError('The null string can only be used when ' + 'the number to Float is passed as a string or an integer.') + try: + Num = decimal.Decimal(num) + except decimal.InvalidOperation: + raise ValueError('string-float not recognized by Decimal: %s' % num) + else: + isint = '.' not in num + num, dps = _decimal_to_Rational_prec(Num) + if num.is_Integer and isint: + # without dec, e-notation is short for int + dps = max(dps, num_digits(num)) + precision = dps_to_prec(dps) + + # decimal precision(dps) is set and maybe binary precision(precision) + # as well.From here on binary precision is used to compute the Float. + # Hence, if supplied use binary precision else translate from decimal + # precision. + + if precision is None or precision == '': + precision = dps_to_prec(dps) + + precision = int(precision) + + if isinstance(num, float): + _mpf_ = mlib.from_float(num, precision, rnd) + elif isinstance(num, str): + _mpf_ = mlib.from_str(num, precision, rnd) + elif isinstance(num, decimal.Decimal): + if num.is_finite(): + _mpf_ = mlib.from_str(str(num), precision, rnd) + elif num.is_nan(): + return S.NaN + elif num.is_infinite(): + if num > 0: + return S.Infinity + return S.NegativeInfinity + else: + raise ValueError("unexpected decimal value %s" % str(num)) + elif isinstance(num, tuple) and len(num) in (3, 4): + if isinstance(num[1], str): + # it's a hexadecimal (coming from a pickled object) + num = list(num) + # If we're loading an object pickled in Python 2 into + # Python 3, we may need to strip a tailing 'L' because + # of a shim for int on Python 3, see issue #13470. + # Strip leading '0x' - gmpy2 only documents such inputs + # with base prefix as valid when the 2nd argument (base) is 0. + # When mpmath uses Sage as the backend, however, it + # ends up including '0x' when preparing the picklable tuple. + # See issue #19690. + num[1] = num[1].removeprefix('0x').removesuffix('L') + # Now we can assume that it is in standard form + num[1] = MPZ(num[1], 16) + _mpf_ = tuple(num) + else: + if len(num) == 4: + # handle normalization hack + return Float._new(num, precision) + else: + if not all(( + num[0] in (0, 1), + num[1] >= 0, + all(type(i) in (int, int) for i in num) + )): + raise ValueError('malformed mpf: %s' % (num,)) + # don't compute number or else it may + # over/underflow + return Float._new( + (num[0], num[1], num[2], bitcount(num[1])), + precision) + elif isinstance(num, (Number, NumberSymbol)): + _mpf_ = num._as_mpf_val(precision) + else: + _mpf_ = mpmath.mpf(num, prec=precision)._mpf_ + + return cls._new(_mpf_, precision, zero=False) + + @classmethod + def _new(cls, _mpf_, _prec, zero=True): + # special cases + if zero and _mpf_ == fzero: + return S.Zero # Float(0) -> 0.0; Float._new((0,0,0,0)) -> 0 + elif _mpf_ == _mpf_nan: + return S.NaN + elif _mpf_ == _mpf_inf: + return S.Infinity + elif _mpf_ == _mpf_ninf: + return S.NegativeInfinity + + obj = Expr.__new__(cls) + obj._mpf_ = mpf_norm(_mpf_, _prec) + obj._prec = _prec + return obj + + def __getnewargs_ex__(self): + sign, man, exp, bc = self._mpf_ + arg = (sign, hex(man)[2:], exp, bc) + kwargs = {'precision': self._prec} + return ((arg,), kwargs) + + def _hashable_content(self): + return (self._mpf_, self._prec) + + def floor(self): + return Integer(int(mlib.to_int( + mlib.mpf_floor(self._mpf_, self._prec)))) + + def ceiling(self): + return Integer(int(mlib.to_int( + mlib.mpf_ceil(self._mpf_, self._prec)))) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + @property + def num(self): + return mpmath.mpf(self._mpf_) + + def _as_mpf_val(self, prec): + rv = mpf_norm(self._mpf_, prec) + if rv != self._mpf_ and self._prec == prec: + debug(self._mpf_, rv) + return rv + + def _as_mpf_op(self, prec): + return self._mpf_, max(prec, self._prec) + + def _eval_is_finite(self): + if self._mpf_ in (_mpf_inf, _mpf_ninf): + return False + return True + + def _eval_is_infinite(self): + if self._mpf_ in (_mpf_inf, _mpf_ninf): + return True + return False + + def _eval_is_integer(self): + if self._mpf_ == fzero: + return True + if not int_valued(self): + return False + + def _eval_is_negative(self): + if self._mpf_ in (_mpf_ninf, _mpf_inf): + return False + return self.num < 0 + + def _eval_is_positive(self): + if self._mpf_ in (_mpf_ninf, _mpf_inf): + return False + return self.num > 0 + + def _eval_is_extended_negative(self): + if self._mpf_ == _mpf_ninf: + return True + if self._mpf_ == _mpf_inf: + return False + return self.num < 0 + + def _eval_is_extended_positive(self): + if self._mpf_ == _mpf_inf: + return True + if self._mpf_ == _mpf_ninf: + return False + return self.num > 0 + + def _eval_is_zero(self): + return self._mpf_ == fzero + + def __bool__(self): + return self._mpf_ != fzero + + def __neg__(self): + if not self: + return self + return Float._new(mlib.mpf_neg(self._mpf_), self._prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_add(self._mpf_, rhs, prec, rnd), prec) + return Number.__add__(self, other) + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_sub(self._mpf_, rhs, prec, rnd), prec) + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mul(self._mpf_, rhs, prec, rnd), prec) + return Number.__mul__(self, other) + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and other != 0 and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_div(self._mpf_, rhs, prec, rnd), prec) + return Number.__truediv__(self, other) + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if isinstance(other, Rational) and other.q != 1 and global_parameters.evaluate: + # calculate mod with Rationals, *then* round the result + return Float(Rational.__mod__(Rational(self), other), + precision=self._prec) + if isinstance(other, Float) and global_parameters.evaluate: + r = self/other + if int_valued(r): + return Float(0, precision=max(self._prec, other._prec)) + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mod(self._mpf_, rhs, prec, rnd), prec) + return Number.__mod__(self, other) + + @_sympifyit('other', NotImplemented) + def __rmod__(self, other): + if isinstance(other, Float) and global_parameters.evaluate: + return other.__mod__(self) + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mod(rhs, self._mpf_, prec, rnd), prec) + return Number.__rmod__(self, other) + + def _eval_power(self, expt): + """ + expt is symbolic object but not equal to 0, 1 + + (-p)**r -> exp(r*log(-p)) -> exp(r*(log(p) + I*Pi)) -> + -> p**r*(sin(Pi*r) + cos(Pi*r)*I) + """ + if equal_valued(self, 0): + if expt.is_extended_positive: + return self + if expt.is_extended_negative: + return S.ComplexInfinity + if isinstance(expt, Number): + if isinstance(expt, Integer): + prec = self._prec + return Float._new( + mlib.mpf_pow_int(self._mpf_, expt.p, prec, rnd), prec) + elif isinstance(expt, Rational) and \ + expt.p == 1 and expt.q % 2 and self.is_negative: + return Pow(S.NegativeOne, expt, evaluate=False)*( + -self)._eval_power(expt) + expt, prec = expt._as_mpf_op(self._prec) + mpfself = self._mpf_ + try: + y = mpf_pow(mpfself, expt, prec, rnd) + return Float._new(y, prec) + except mlib.ComplexResult: + re, im = mlib.mpc_pow( + (mpfself, fzero), (expt, fzero), prec, rnd) + return Float._new(re, prec) + \ + Float._new(im, prec)*S.ImaginaryUnit + + def __abs__(self): + return Float._new(mlib.mpf_abs(self._mpf_), self._prec) + + def __int__(self): + if self._mpf_ == fzero: + return 0 + return int(mlib.to_int(self._mpf_)) # uses round_fast = round_down + + def __eq__(self, other): + if isinstance(other, float): + other = Float(other) + return Basic.__eq__(self, other) + + def __ne__(self, other): + eq = self.__eq__(other) + if eq is NotImplemented: + return eq + else: + return not eq + + def __hash__(self): + float_val = float(self) + if not math.isinf(float_val): + return hash(float_val) + return Basic.__hash__(self) + + def _Frel(self, other, op): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Rational: + # test self*other.q other.p without losing precision + ''' + >>> f = Float(.1,2) + >>> i = 1234567890 + >>> (f*i)._mpf_ + (0, 471, 18, 9) + >>> mlib.mpf_mul(f._mpf_, mlib.from_int(i)) + (0, 505555550955, -12, 39) + ''' + smpf = mlib.mpf_mul(self._mpf_, mlib.from_int(other.q)) + ompf = mlib.from_int(other.p) + return _sympify(bool(op(smpf, ompf))) + elif other.is_Float: + return _sympify(bool( + op(self._mpf_, other._mpf_))) + elif other.is_comparable and other not in ( + S.Infinity, S.NegativeInfinity): + other = other.evalf(prec_to_dps(self._prec)) + if other._prec > 1: + if other.is_Number: + return _sympify(bool( + op(self._mpf_, other._as_mpf_val(self._prec)))) + + def __gt__(self, other): + if isinstance(other, NumberSymbol): + return other.__lt__(self) + rv = self._Frel(other, mlib.mpf_gt) + if rv is None: + return Expr.__gt__(self, other) + return rv + + def __ge__(self, other): + if isinstance(other, NumberSymbol): + return other.__le__(self) + rv = self._Frel(other, mlib.mpf_ge) + if rv is None: + return Expr.__ge__(self, other) + return rv + + def __lt__(self, other): + if isinstance(other, NumberSymbol): + return other.__gt__(self) + rv = self._Frel(other, mlib.mpf_lt) + if rv is None: + return Expr.__lt__(self, other) + return rv + + def __le__(self, other): + if isinstance(other, NumberSymbol): + return other.__ge__(self) + rv = self._Frel(other, mlib.mpf_le) + if rv is None: + return Expr.__le__(self, other) + return rv + + def epsilon_eq(self, other, epsilon="1e-15"): + return abs(self - other) < Float(epsilon) + + def __format__(self, format_spec): + return format(decimal.Decimal(str(self)), format_spec) + + +# Add sympify converters +_sympy_converter[float] = _sympy_converter[decimal.Decimal] = Float + +# this is here to work nicely in Sage +RealNumber = Float + + +class Rational(Number): + """Represents rational numbers (p/q) of any size. + + Examples + ======== + + >>> from sympy import Rational, nsimplify, S, pi + >>> Rational(1, 2) + 1/2 + + Rational is unprejudiced in accepting input. If a float is passed, the + underlying value of the binary representation will be returned: + + >>> Rational(.5) + 1/2 + >>> Rational(.2) + 3602879701896397/18014398509481984 + + If the simpler representation of the float is desired then consider + limiting the denominator to the desired value or convert the float to + a string (which is roughly equivalent to limiting the denominator to + 10**12): + + >>> Rational(str(.2)) + 1/5 + >>> Rational(.2).limit_denominator(10**12) + 1/5 + + An arbitrarily precise Rational is obtained when a string literal is + passed: + + >>> Rational("1.23") + 123/100 + >>> Rational('1e-2') + 1/100 + >>> Rational(".1") + 1/10 + >>> Rational('1e-2/3.2') + 1/320 + + The conversion of other types of strings can be handled by + the sympify() function, and conversion of floats to expressions + or simple fractions can be handled with nsimplify: + + >>> S('.[3]') # repeating digits in brackets + 1/3 + >>> S('3**2/10') # general expressions + 9/10 + >>> nsimplify(.3) # numbers that have a simple form + 3/10 + + But if the input does not reduce to a literal Rational, an error will + be raised: + + >>> Rational(pi) + Traceback (most recent call last): + ... + TypeError: invalid input: pi + + + Low-level + --------- + + Access numerator and denominator as .p and .q: + + >>> r = Rational(3, 4) + >>> r + 3/4 + >>> r.p + 3 + >>> r.q + 4 + + Note that p and q return integers (not SymPy Integers) so some care + is needed when using them in expressions: + + >>> r.p/r.q + 0.75 + + See Also + ======== + sympy.core.sympify.sympify, sympy.simplify.simplify.nsimplify + """ + is_real = True + is_integer = False + is_rational = True + is_number = True + + __slots__ = ('p', 'q') + + p: int + q: int + + is_Rational = True + + @cacheit + def __new__(cls, p, q=None, gcd=None): + if q is None: + if isinstance(p, Rational): + return p + + if isinstance(p, SYMPY_INTS): + pass + else: + if isinstance(p, (float, Float)): + return Rational(*_as_integer_ratio(p)) + + if not isinstance(p, str): + try: + p = sympify(p) + except (SympifyError, SyntaxError): + pass # error will raise below + else: + if p.count('/') > 1: + raise TypeError('invalid input: %s' % p) + p = p.replace(' ', '') + pq = p.rsplit('/', 1) + if len(pq) == 2: + p, q = pq + fp = fractions.Fraction(p) + fq = fractions.Fraction(q) + p = fp/fq + try: + p = fractions.Fraction(p) + except ValueError: + pass # error will raise below + else: + return cls._new(p.numerator, p.denominator, 1) + + if not isinstance(p, Rational): + raise TypeError('invalid input: %s' % p) + + q = 1 + + Q = 1 + + if not isinstance(p, SYMPY_INTS): + p = Rational(p) + Q *= p.q + p = p.p + else: + p = int(p) + + if not isinstance(q, SYMPY_INTS): + q = Rational(q) + p *= q.q + Q *= q.p + else: + Q *= int(q) + q = Q + + if gcd is not None: + sympy_deprecation_warning( + "gcd is deprecated in Rational, use nsimplify instead", + deprecated_since_version="1.11", + active_deprecations_target="deprecated-rational-gcd", + stacklevel=4, + ) + return cls._new(p, q, gcd) + + # p and q are now ints + return cls._new(p, q) + + @classmethod + def _new(cls, p, q, gcd=None): + if q == 0: + if p == 0: + if _errdict["divide"]: + raise ValueError("Indeterminate 0/0") + else: + return S.NaN + return S.ComplexInfinity + + if q < 0: + q = -q + p = -p + + if gcd is None: + gcd = igcd(abs(p), q) + + if gcd > 1: + p //= gcd + q //= gcd + + return cls.from_coprime_ints(p, q) + + @classmethod + def from_coprime_ints(cls, p: int, q: int) -> Rational: + """Create a Rational from a pair of coprime integers. + + Both ``p`` and ``q`` should be strictly of type ``int``. + + The caller should ensure that ``gcd(p,q) == 1`` and ``q > 0``. + + This may be more efficient than ``Rational(p, q)``. The validity of the + arguments may or may not be checked so it should not be relied upon to + pass unvalidated or invalid arguments to this function. + """ + if q == 1: + return Integer(p) + if p == 1 and q == 2: + return S.Half + + obj = Expr.__new__(cls) + obj.p = p + obj.q = q + return obj + + def limit_denominator(self, max_denominator=1000000): + """Closest Rational to self with denominator at most max_denominator. + + Examples + ======== + + >>> from sympy import Rational + >>> Rational('3.141592653589793').limit_denominator(10) + 22/7 + >>> Rational('3.141592653589793').limit_denominator(100) + 311/99 + + """ + f = fractions.Fraction(self.p, self.q) + return Rational(f.limit_denominator(fractions.Fraction(int(max_denominator)))) + + def __getnewargs__(self): + return (self.p, self.q) + + def _hashable_content(self): + return (self.p, self.q) + + def _eval_is_positive(self): + return self.p > 0 + + def _eval_is_zero(self): + return self.p == 0 + + def __neg__(self): + return Rational(-self.p, self.q) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p + self.q*other.p, self.q, 1) + elif isinstance(other, Rational): + #TODO: this can probably be optimized more + return Rational(self.p*other.q + self.q*other.p, self.q*other.q) + elif isinstance(other, Float): + return other + self + else: + return Number.__add__(self, other) + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p - self.q*other.p, self.q, 1) + elif isinstance(other, Rational): + return Rational(self.p*other.q - self.q*other.p, self.q*other.q) + elif isinstance(other, Float): + return -other + self + else: + return Number.__sub__(self, other) + return Number.__sub__(self, other) + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.q*other.p - self.p, self.q, 1) + elif isinstance(other, Rational): + return Rational(self.q*other.p - self.p*other.q, self.q*other.q) + elif isinstance(other, Float): + return -self + other + else: + return Number.__rsub__(self, other) + return Number.__rsub__(self, other) + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p*other.p, self.q, igcd(other.p, self.q)) + elif isinstance(other, Rational): + return Rational._new(self.p*other.p, self.q*other.q, igcd(self.p, other.q)*igcd(self.q, other.p)) + elif isinstance(other, Float): + return other*self + else: + return Number.__mul__(self, other) + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + if self.p and other.p == S.Zero: + return S.ComplexInfinity + else: + return Rational._new(self.p, self.q*other.p, igcd(self.p, other.p)) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q, self.q*other.p, igcd(self.p, other.p)*igcd(self.q, other.q)) + elif isinstance(other, Float): + return self*(1/other) + else: + return Number.__truediv__(self, other) + return Number.__truediv__(self, other) + @_sympifyit('other', NotImplemented) + def __rtruediv__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(other.p*self.q, self.p, igcd(self.p, other.p)) + elif isinstance(other, Rational): + return Rational._new(other.p*self.q, other.q*self.p, igcd(self.p, other.p)*igcd(self.q, other.q)) + elif isinstance(other, Float): + return other*(1/self) + else: + return Number.__rtruediv__(self, other) + return Number.__rtruediv__(self, other) + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if global_parameters.evaluate: + if isinstance(other, Rational): + n = (self.p*other.q) // (other.p*self.q) + return Rational(self.p*other.q - n*other.p*self.q, self.q*other.q) + if isinstance(other, Float): + # calculate mod with Rationals, *then* round the answer + return Float(self.__mod__(Rational(other)), + precision=other._prec) + return Number.__mod__(self, other) + return Number.__mod__(self, other) + + @_sympifyit('other', NotImplemented) + def __rmod__(self, other): + if isinstance(other, Rational): + return Rational.__mod__(other, self) + return Number.__rmod__(self, other) + + def _eval_power(self, expt): + if isinstance(expt, Number): + if isinstance(expt, Float): + return self._eval_evalf(expt._prec)**expt + if expt.is_extended_negative: + # (3/4)**-2 -> (4/3)**2 + ne = -expt + if (ne is S.One): + return Rational(self.q, self.p) + if self.is_negative: + return S.NegativeOne**expt*Rational(self.q, -self.p)**ne + else: + return Rational(self.q, self.p)**ne + if expt is S.Infinity: # -oo already caught by test for negative + if self.p > self.q: + # (3/2)**oo -> oo + return S.Infinity + if self.p < -self.q: + # (-3/2)**oo -> oo + I*oo + return S.Infinity + S.Infinity*S.ImaginaryUnit + return S.Zero + if isinstance(expt, Integer): + # (4/3)**2 -> 4**2 / 3**2 + return Rational._new(self.p**expt.p, self.q**expt.p, 1) + if isinstance(expt, Rational): + intpart = expt.p // expt.q + if intpart: + intpart += 1 + remfracpart = intpart*expt.q - expt.p + ratfracpart = Rational(remfracpart, expt.q) + if self.p != 1: + return Integer(self.p)**expt*Integer(self.q)**ratfracpart*Rational._new(1, self.q**intpart, 1) + return Integer(self.q)**ratfracpart*Rational._new(1, self.q**intpart, 1) + else: + remfracpart = expt.q - expt.p + ratfracpart = Rational(remfracpart, expt.q) + if self.p != 1: + return Integer(self.p)**expt*Integer(self.q)**ratfracpart*Rational._new(1, self.q, 1) + return Integer(self.q)**ratfracpart*Rational._new(1, self.q, 1) + + if self.is_extended_negative and expt.is_even: + return (-self)**expt + + return + + def _as_mpf_val(self, prec): + return mlib.from_rational(self.p, self.q, prec, rnd) + + def _mpmath_(self, prec, rnd): + return mpmath.make_mpf(mlib.from_rational(self.p, self.q, prec, rnd)) + + def __abs__(self): + return Rational(abs(self.p), self.q) + + def __int__(self): + p, q = self.p, self.q + if p < 0: + return -int(-p//q) + return int(p//q) + + def floor(self): + return Integer(self.p // self.q) + + def ceiling(self): + return -Integer(-self.p // self.q) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def __eq__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if not isinstance(other, Number): + # S(0) == S.false is False + # S(0) == False is True + return False + if other.is_NumberSymbol: + if other.is_irrational: + return False + return other.__eq__(self) + if other.is_Rational: + # a Rational is always in reduced form so will never be 2/4 + # so we can just check equivalence of args + return self.p == other.p and self.q == other.q + return False + + def __ne__(self, other): + return not self == other + + def _Rrel(self, other, attr): + # if you want self < other, pass self, other, __gt__ + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Number: + op = None + s, o = self, other + if other.is_NumberSymbol: + op = getattr(o, attr) + elif other.is_Float: + op = getattr(o, attr) + elif other.is_Rational: + s, o = Integer(s.p*o.q), Integer(s.q*o.p) + op = getattr(o, attr) + if op: + return op(s) + if o.is_number and o.is_extended_real: + return Integer(s.p), s.q*o + + def __gt__(self, other): + rv = self._Rrel(other, '__lt__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__gt__(*rv) + + def __ge__(self, other): + rv = self._Rrel(other, '__le__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__ge__(*rv) + + def __lt__(self, other): + rv = self._Rrel(other, '__gt__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__lt__(*rv) + + def __le__(self, other): + rv = self._Rrel(other, '__ge__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__le__(*rv) + + def __hash__(self): + return super().__hash__() + + def factors(self, limit=None, use_trial=True, use_rho=False, + use_pm1=False, verbose=False, visual=False): + """A wrapper to factorint which return factors of self that are + smaller than limit (or cheap to compute). Special methods of + factoring are disabled by default so that only trial division is used. + """ + from sympy.ntheory.factor_ import factorrat + + return factorrat(self, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose).copy() + + @property + def numerator(self): + return self.p + + @property + def denominator(self): + return self.q + + @_sympifyit('other', NotImplemented) + def gcd(self, other): + if isinstance(other, Rational): + if other == S.Zero: + return other + return Rational( + igcd(self.p, other.p), + ilcm(self.q, other.q)) + return Number.gcd(self, other) + + @_sympifyit('other', NotImplemented) + def lcm(self, other): + if isinstance(other, Rational): + return Rational( + self.p // igcd(self.p, other.p) * other.p, + igcd(self.q, other.q)) + return Number.lcm(self, other) + + def as_numer_denom(self): + return Integer(self.p), Integer(self.q) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import S + >>> (S(-3)/2).as_content_primitive() + (3/2, -1) + + See docstring of Expr.as_content_primitive for more examples. + """ + + if self: + if self.is_positive: + return self, S.One + return -self, S.NegativeOne + return S.One, self + + def as_coeff_Mul(self, rational=False): + """Efficiently extract the coefficient of a product.""" + return self, S.One + + def as_coeff_Add(self, rational=False): + """Efficiently extract the coefficient of a summation.""" + return self, S.Zero + + +class Integer(Rational): + """Represents integer numbers of any size. + + Examples + ======== + + >>> from sympy import Integer + >>> Integer(3) + 3 + + If a float or a rational is passed to Integer, the fractional part + will be discarded; the effect is of rounding toward zero. + + >>> Integer(3.8) + 3 + >>> Integer(-3.8) + -3 + + A string is acceptable input if it can be parsed as an integer: + + >>> Integer("9" * 20) + 99999999999999999999 + + It is rarely needed to explicitly instantiate an Integer, because + Python integers are automatically converted to Integer when they + are used in SymPy expressions. + """ + q = 1 + is_integer = True + is_number = True + + is_Integer = True + + __slots__ = () + + def _as_mpf_val(self, prec): + return mlib.from_int(self.p, prec, rnd) + + def _mpmath_(self, prec, rnd): + return mpmath.make_mpf(self._as_mpf_val(prec)) + + @cacheit + def __new__(cls, i): + if isinstance(i, str): + i = i.replace(' ', '') + # whereas we cannot, in general, make a Rational from an + # arbitrary expression, we can make an Integer unambiguously + # (except when a non-integer expression happens to round to + # an integer). So we proceed by taking int() of the input and + # let the int routines determine whether the expression can + # be made into an int or whether an error should be raised. + try: + ival = int(i) + except TypeError: + raise TypeError( + "Argument of Integer should be of numeric type, got %s." % i) + # We only work with well-behaved integer types. This converts, for + # example, numpy.int32 instances. + if ival == 1: + return S.One + if ival == -1: + return S.NegativeOne + if ival == 0: + return S.Zero + obj = Expr.__new__(cls) + obj.p = ival + return obj + + def __getnewargs__(self): + return (self.p,) + + # Arithmetic operations are here for efficiency + def __int__(self): + return self.p + + def floor(self): + return Integer(self.p) + + def ceiling(self): + return Integer(self.p) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def __neg__(self): + return Integer(-self.p) + + def __abs__(self): + if self.p >= 0: + return self + else: + return Integer(-self.p) + + def __divmod__(self, other): + if isinstance(other, Integer) and global_parameters.evaluate: + return Tuple(*(divmod(self.p, other.p))) + else: + return Number.__divmod__(self, other) + + def __rdivmod__(self, other): + if isinstance(other, int) and global_parameters.evaluate: + return Tuple(*(divmod(other, self.p))) + else: + try: + other = Number(other) + except TypeError: + msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" + oname = type(other).__name__ + sname = type(self).__name__ + raise TypeError(msg % (oname, sname)) + return Number.__divmod__(other, self) + + # TODO make it decorator + bytecodehacks? + def __add__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p + other) + elif isinstance(other, Integer): + return Integer(self.p + other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q + other.p, other.q, 1) + return Rational.__add__(self, other) + else: + return Add(self, other) + + def __radd__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other + self.p) + elif isinstance(other, Rational): + return Rational._new(other.p + self.p*other.q, other.q, 1) + return Rational.__radd__(self, other) + return Rational.__radd__(self, other) + + def __sub__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p - other) + elif isinstance(other, Integer): + return Integer(self.p - other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q - other.p, other.q, 1) + return Rational.__sub__(self, other) + return Rational.__sub__(self, other) + + def __rsub__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other - self.p) + elif isinstance(other, Rational): + return Rational._new(other.p - self.p*other.q, other.q, 1) + return Rational.__rsub__(self, other) + return Rational.__rsub__(self, other) + + def __mul__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p*other) + elif isinstance(other, Integer): + return Integer(self.p*other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.p, other.q, igcd(self.p, other.q)) + return Rational.__mul__(self, other) + return Rational.__mul__(self, other) + + def __rmul__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other*self.p) + elif isinstance(other, Rational): + return Rational._new(other.p*self.p, other.q, igcd(self.p, other.q)) + return Rational.__rmul__(self, other) + return Rational.__rmul__(self, other) + + def __mod__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p % other) + elif isinstance(other, Integer): + return Integer(self.p % other.p) + return Rational.__mod__(self, other) + return Rational.__mod__(self, other) + + def __rmod__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other % self.p) + elif isinstance(other, Integer): + return Integer(other.p % self.p) + return Rational.__rmod__(self, other) + return Rational.__rmod__(self, other) + + def __eq__(self, other): + if isinstance(other, int): + return (self.p == other) + elif isinstance(other, Integer): + return (self.p == other.p) + return Rational.__eq__(self, other) + + def __ne__(self, other): + return not self == other + + def __gt__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p > other.p) + return Rational.__gt__(self, other) + + def __lt__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p < other.p) + return Rational.__lt__(self, other) + + def __ge__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p >= other.p) + return Rational.__ge__(self, other) + + def __le__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p <= other.p) + return Rational.__le__(self, other) + + def __hash__(self): + return hash(self.p) + + def __index__(self): + return self.p + + ######################################## + + def _eval_is_odd(self): + return bool(self.p % 2) + + def _eval_power(self, expt): + """ + Tries to do some simplifications on self**expt + + Returns None if no further simplifications can be done. + + Explanation + =========== + + When exponent is a fraction (so we have for example a square root), + we try to find a simpler representation by factoring the argument + up to factors of 2**15, e.g. + + - sqrt(4) becomes 2 + - sqrt(-4) becomes 2*I + - (2**(3+7)*3**(6+7))**Rational(1,7) becomes 6*18**(3/7) + + Further simplification would require a special call to factorint on + the argument which is not done here for sake of speed. + + """ + from sympy.ntheory.factor_ import perfect_power + + if expt is S.Infinity: + if self.p > S.One: + return S.Infinity + # cases -1, 0, 1 are done in their respective classes + return S.Infinity + S.ImaginaryUnit*S.Infinity + if expt is S.NegativeInfinity: + return Rational._new(1, self, 1)**S.Infinity + if not isinstance(expt, Number): + # simplify when expt is even + # (-2)**k --> 2**k + if self.is_negative and expt.is_even: + return (-self)**expt + if isinstance(expt, Float): + # Rational knows how to exponentiate by a Float + return super()._eval_power(expt) + if not isinstance(expt, Rational): + return + if expt is S.Half and self.is_negative: + # we extract I for this special case since everyone is doing so + return S.ImaginaryUnit*Pow(-self, expt) + if expt.is_negative: + # invert base and change sign on exponent + ne = -expt + if self.is_negative: + return S.NegativeOne**expt*Rational._new(1, -self.p, 1)**ne + else: + return Rational._new(1, self.p, 1)**ne + # see if base is a perfect root, sqrt(4) --> 2 + x, xexact = integer_nthroot(abs(self.p), expt.q) + if xexact: + # if it's a perfect root we've finished + result = Integer(x**abs(expt.p)) + if self.is_negative: + result *= S.NegativeOne**expt + return result + + # The following is an algorithm where we collect perfect roots + # from the factors of base. + + # if it's not an nth root, it still might be a perfect power + b_pos = int(abs(self.p)) + p = perfect_power(b_pos) + if p is not False: + # XXX: Convert to int because perfect_power may return fmpz + # Ideally that should be fixed in perfect_power though... + dict = {int(p[0]): int(p[1])} + else: + dict = Integer(b_pos).factors(limit=2**15) + + # now process the dict of factors + out_int = 1 # integer part + out_rad = 1 # extracted radicals + sqr_int = 1 + sqr_gcd = 0 + sqr_dict = {} + for prime, exponent in dict.items(): + exponent *= expt.p + # remove multiples of expt.q: (2**12)**(1/10) -> 2*(2**2)**(1/10) + div_e, div_m = divmod(exponent, expt.q) + if div_e > 0: + out_int *= prime**div_e + if div_m > 0: + # see if the reduced exponent shares a gcd with e.q + # (2**2)**(1/10) -> 2**(1/5) + g = igcd(div_m, expt.q) + if g != 1: + out_rad *= Pow(prime, Rational._new(div_m//g, expt.q//g, 1)) + else: + sqr_dict[prime] = div_m + # identify gcd of remaining powers + for p, ex in sqr_dict.items(): + if sqr_gcd == 0: + sqr_gcd = ex + else: + sqr_gcd = igcd(sqr_gcd, ex) + if sqr_gcd == 1: + break + for k, v in sqr_dict.items(): + sqr_int *= k**(v//sqr_gcd) + if sqr_int == b_pos and out_int == 1 and out_rad == 1: + result = None + else: + result = out_int*out_rad*Pow(sqr_int, Rational(sqr_gcd, expt.q)) + if self.is_negative: + result *= Pow(S.NegativeOne, expt) + return result + + def _eval_is_prime(self): + from sympy.ntheory.primetest import isprime + + return isprime(self) + + def _eval_is_composite(self): + if self > 1: + return fuzzy_not(self.is_prime) + else: + return False + + def as_numer_denom(self): + return self, S.One + + @_sympifyit('other', NotImplemented) + def __floordiv__(self, other): + if not isinstance(other, Expr): + return NotImplemented + if isinstance(other, Integer): + return Integer(self.p // other) + return divmod(self, other)[0] + + def __rfloordiv__(self, other): + return Integer(Integer(other).p // self.p) + + # These bitwise operations (__lshift__, __rlshift__, ..., __invert__) are defined + # for Integer only and not for general SymPy expressions. This is to achieve + # compatibility with the numbers.Integral ABC which only defines these operations + # among instances of numbers.Integral. Therefore, these methods check explicitly for + # integer types rather than using sympify because they should not accept arbitrary + # symbolic expressions and there is no symbolic analogue of numbers.Integral's + # bitwise operations. + def __lshift__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p << int(other)) + else: + return NotImplemented + + def __rlshift__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) << self.p) + else: + return NotImplemented + + def __rshift__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p >> int(other)) + else: + return NotImplemented + + def __rrshift__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) >> self.p) + else: + return NotImplemented + + def __and__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p & int(other)) + else: + return NotImplemented + + def __rand__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) & self.p) + else: + return NotImplemented + + def __xor__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p ^ int(other)) + else: + return NotImplemented + + def __rxor__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) ^ self.p) + else: + return NotImplemented + + def __or__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p | int(other)) + else: + return NotImplemented + + def __ror__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) | self.p) + else: + return NotImplemented + + def __invert__(self): + return Integer(~self.p) + +# Add sympify converters +_sympy_converter[int] = Integer + + +class AlgebraicNumber(Expr): + r""" + Class for representing algebraic numbers in SymPy. + + Symbolically, an instance of this class represents an element + $\alpha \in \mathbb{Q}(\theta) \hookrightarrow \mathbb{C}$. That is, the + algebraic number $\alpha$ is represented as an element of a particular + number field $\mathbb{Q}(\theta)$, with a particular embedding of this + field into the complex numbers. + + Formally, the primitive element $\theta$ is given by two data points: (1) + its minimal polynomial (which defines $\mathbb{Q}(\theta)$), and (2) a + particular complex number that is a root of this polynomial (which defines + the embedding $\mathbb{Q}(\theta) \hookrightarrow \mathbb{C}$). Finally, + the algebraic number $\alpha$ which we represent is then given by the + coefficients of a polynomial in $\theta$. + """ + + __slots__ = ('rep', 'root', 'alias', 'minpoly', '_own_minpoly') + + is_AlgebraicNumber = True + is_algebraic = True + is_number = True + + + kind = NumberKind + + # Optional alias symbol is not free. + # Actually, alias should be a Str, but some methods + # expect that it be an instance of Expr. + free_symbols: set[Basic] = set() + + def __new__(cls, expr, coeffs=None, alias=None, **args): + r""" + Construct a new algebraic number $\alpha$ belonging to a number field + $k = \mathbb{Q}(\theta)$. + + There are four instance attributes to be determined: + + =========== ============================================================================ + Attribute Type/Meaning + =========== ============================================================================ + ``root`` :py:class:`~.Expr` for $\theta$ as a complex number + ``minpoly`` :py:class:`~.Poly`, the minimal polynomial of $\theta$ + ``rep`` :py:class:`~sympy.polys.polyclasses.DMP` giving $\alpha$ as poly in $\theta$ + ``alias`` :py:class:`~.Symbol` for $\theta$, or ``None`` + =========== ============================================================================ + + See Parameters section for how they are determined. + + Parameters + ========== + + expr : :py:class:`~.Expr`, or pair $(m, r)$ + There are three distinct modes of construction, depending on what + is passed as *expr*. + + **(1)** *expr* is an :py:class:`~.AlgebraicNumber`: + In this case we begin by copying all four instance attributes from + *expr*. If *coeffs* were also given, we compose the two coeff + polynomials (see below). If an *alias* was given, it overrides. + + **(2)** *expr* is any other type of :py:class:`~.Expr`: + Then ``root`` will equal *expr*. Therefore it + must express an algebraic quantity, and we will compute its + ``minpoly``. + + **(3)** *expr* is an ordered pair $(m, r)$ giving the + ``minpoly`` $m$, and a ``root`` $r$ thereof, which together + define $\theta$. In this case $m$ may be either a univariate + :py:class:`~.Poly` or any :py:class:`~.Expr` which represents the + same, while $r$ must be some :py:class:`~.Expr` representing a + complex number that is a root of $m$, including both explicit + expressions in radicals, and instances of + :py:class:`~.ComplexRootOf` or :py:class:`~.AlgebraicNumber`. + + coeffs : list, :py:class:`~.ANP`, None, optional (default=None) + This defines ``rep``, giving the algebraic number $\alpha$ as a + polynomial in $\theta$. + + If a list, the elements should be integers or rational numbers. + If an :py:class:`~.ANP`, we take its coefficients (using its + :py:meth:`~.ANP.to_list()` method). If ``None``, then the list of + coefficients defaults to ``[1, 0]``, meaning that $\alpha = \theta$ + is the primitive element of the field. + + If *expr* was an :py:class:`~.AlgebraicNumber`, let $g(x)$ be its + ``rep`` polynomial, and let $f(x)$ be the polynomial defined by + *coeffs*. Then ``self.rep`` will represent the composition + $(f \circ g)(x)$. + + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + This is a way to provide a name for the primitive element. We + described several ways in which the *expr* argument can define the + value of the primitive element, but none of these methods gave it + a name. Here, for example, *alias* could be set as + ``Symbol('theta')``, in order to make this symbol appear when + $\alpha$ is printed, or rendered as a polynomial, using the + :py:meth:`~.as_poly()` method. + + Examples + ======== + + Recall that we are constructing an algebraic number as a field element + $\alpha \in \mathbb{Q}(\theta)$. + + >>> from sympy import AlgebraicNumber, sqrt, CRootOf, S + >>> from sympy.abc import x + + Example (1): $\alpha = \theta = \sqrt{2}$ + + >>> a1 = AlgebraicNumber(sqrt(2)) + >>> a1.minpoly_of_element().as_expr(x) + x**2 - 2 + >>> a1.evalf(10) + 1.414213562 + + Example (2): $\alpha = 3 \sqrt{2} - 5$, $\theta = \sqrt{2}$. We can + either build on the last example: + + >>> a2 = AlgebraicNumber(a1, [3, -5]) + >>> a2.as_expr() + -5 + 3*sqrt(2) + + or start from scratch: + + >>> a2 = AlgebraicNumber(sqrt(2), [3, -5]) + >>> a2.as_expr() + -5 + 3*sqrt(2) + + Example (3): $\alpha = 6 \sqrt{2} - 11$, $\theta = \sqrt{2}$. Again we + can build on the previous example, and we see that the coeff polys are + composed: + + >>> a3 = AlgebraicNumber(a2, [2, -1]) + >>> a3.as_expr() + -11 + 6*sqrt(2) + + reflecting the fact that $(2x - 1) \circ (3x - 5) = 6x - 11$. + + Example (4): $\alpha = \sqrt{2}$, $\theta = \sqrt{2} + \sqrt{3}$. The + easiest way is to use the :py:func:`~.to_number_field()` function: + + >>> from sympy import to_number_field + >>> a4 = to_number_field(sqrt(2), sqrt(2) + sqrt(3)) + >>> a4.minpoly_of_element().as_expr(x) + x**2 - 2 + >>> a4.to_root() + sqrt(2) + >>> a4.primitive_element() + sqrt(2) + sqrt(3) + >>> a4.coeffs() + [1/2, 0, -9/2, 0] + + but if you already knew the right coefficients, you could construct it + directly: + + >>> a4 = AlgebraicNumber(sqrt(2) + sqrt(3), [S(1)/2, 0, S(-9)/2, 0]) + >>> a4.to_root() + sqrt(2) + >>> a4.primitive_element() + sqrt(2) + sqrt(3) + + Example (5): Construct the Golden Ratio as an element of the 5th + cyclotomic field, supposing we already know its coefficients. This time + we introduce the alias $\zeta$ for the primitive element of the field: + + >>> from sympy import cyclotomic_poly + >>> from sympy.abc import zeta + >>> a5 = AlgebraicNumber(CRootOf(cyclotomic_poly(5), -1), + ... [-1, -1, 0, 0], alias=zeta) + >>> a5.as_poly().as_expr() + -zeta**3 - zeta**2 + >>> a5.evalf() + 1.61803398874989 + + (The index ``-1`` to ``CRootOf`` selects the complex root with the + largest real and imaginary parts, which in this case is + $\mathrm{e}^{2i\pi/5}$. See :py:class:`~.ComplexRootOf`.) + + Example (6): Building on the last example, construct the number + $2 \phi \in \mathbb{Q}(\phi)$, where $\phi$ is the Golden Ratio: + + >>> from sympy.abc import phi + >>> a6 = AlgebraicNumber(a5.to_root(), coeffs=[2, 0], alias=phi) + >>> a6.as_poly().as_expr() + 2*phi + >>> a6.primitive_element().evalf() + 1.61803398874989 + + Note that we needed to use ``a5.to_root()``, since passing ``a5`` as + the first argument would have constructed the number $2 \phi$ as an + element of the field $\mathbb{Q}(\zeta)$: + + >>> a6_wrong = AlgebraicNumber(a5, coeffs=[2, 0]) + >>> a6_wrong.as_poly().as_expr() + -2*zeta**3 - 2*zeta**2 + >>> a6_wrong.primitive_element().evalf() + 0.309016994374947 + 0.951056516295154*I + + """ + from sympy.polys.polyclasses import ANP, DMP + from sympy.polys.numberfields import minimal_polynomial + + expr = sympify(expr) + rep0 = None + alias0 = None + + if isinstance(expr, (tuple, Tuple)): + minpoly, root = expr + + if not minpoly.is_Poly: + from sympy.polys.polytools import Poly + minpoly = Poly(minpoly) + elif expr.is_AlgebraicNumber: + minpoly, root, rep0, alias0 = (expr.minpoly, expr.root, + expr.rep, expr.alias) + else: + minpoly, root = minimal_polynomial( + expr, args.get('gen'), polys=True), expr + + dom = minpoly.get_domain() + + if coeffs is not None: + if not isinstance(coeffs, ANP): + rep = DMP.from_sympy_list(sympify(coeffs), 0, dom) + scoeffs = Tuple(*coeffs) + else: + rep = DMP.from_list(coeffs.to_list(), 0, dom) + scoeffs = Tuple(*coeffs.to_list()) + + else: + rep = DMP.from_list([1, 0], 0, dom) + scoeffs = Tuple(1, 0) + + if rep0 is not None: + from sympy.polys.densetools import dup_compose + c = dup_compose(rep.to_list(), rep0.to_list(), dom) + rep = DMP.from_list(c, 0, dom) + scoeffs = Tuple(*c) + + if rep.degree() >= minpoly.degree(): + rep = rep.rem(minpoly.rep) + + sargs = (root, scoeffs) + + alias = alias or alias0 + if alias is not None: + from .symbol import Symbol + if not isinstance(alias, Symbol): + alias = Symbol(alias) + sargs = sargs + (alias,) + + obj = Expr.__new__(cls, *sargs) + + obj.rep = rep + obj.root = root + obj.alias = alias + obj.minpoly = minpoly + + obj._own_minpoly = None + + return obj + + def __hash__(self): + return super().__hash__() + + def _eval_evalf(self, prec): + return self.as_expr()._evalf(prec) + + @property + def is_aliased(self): + """Returns ``True`` if ``alias`` was set. """ + return self.alias is not None + + def as_poly(self, x=None): + """Create a Poly instance from ``self``. """ + from sympy.polys.polytools import Poly, PurePoly + if x is not None: + return Poly.new(self.rep, x) + else: + if self.alias is not None: + return Poly.new(self.rep, self.alias) + else: + from .symbol import Dummy + return PurePoly.new(self.rep, Dummy('x')) + + def as_expr(self, x=None): + """Create a Basic expression from ``self``. """ + return self.as_poly(x or self.root).as_expr().expand() + + def coeffs(self): + """Returns all SymPy coefficients of an algebraic number. """ + return [ self.rep.dom.to_sympy(c) for c in self.rep.all_coeffs() ] + + def native_coeffs(self): + """Returns all native coefficients of an algebraic number. """ + return self.rep.all_coeffs() + + def to_algebraic_integer(self): + """Convert ``self`` to an algebraic integer. """ + from sympy.polys.polytools import Poly + + f = self.minpoly + + if f.LC() == 1: + return self + + coeff = f.LC()**(f.degree() - 1) + poly = f.compose(Poly(f.gen/f.LC())) + + minpoly = poly*coeff + root = f.LC()*self.root + + return AlgebraicNumber((minpoly, root), self.coeffs()) + + def _eval_simplify(self, **kwargs): + from sympy.polys.rootoftools import CRootOf + from sympy.polys import minpoly + measure, ratio = kwargs['measure'], kwargs['ratio'] + for r in [r for r in self.minpoly.all_roots() if r.func != CRootOf]: + if minpoly(self.root - r).is_Symbol: + # use the matching root if it's simpler + if measure(r) < ratio*measure(self.root): + return AlgebraicNumber(r) + return self + + def field_element(self, coeffs): + r""" + Form another element of the same number field. + + Explanation + =========== + + If we represent $\alpha \in \mathbb{Q}(\theta)$, form another element + $\beta \in \mathbb{Q}(\theta)$ of the same number field. + + Parameters + ========== + + coeffs : list, :py:class:`~.ANP` + Like the *coeffs* arg to the class + :py:meth:`constructor<.AlgebraicNumber.__new__>`, defines the + new element as a polynomial in the primitive element. + + If a list, the elements should be integers or rational numbers. + If an :py:class:`~.ANP`, we take its coefficients (using its + :py:meth:`~.ANP.to_list()` method). + + Examples + ======== + + >>> from sympy import AlgebraicNumber, sqrt + >>> a = AlgebraicNumber(sqrt(5), [-1, 1]) + >>> b = a.field_element([3, 2]) + >>> print(a) + 1 - sqrt(5) + >>> print(b) + 2 + 3*sqrt(5) + >>> print(b.primitive_element() == a.primitive_element()) + True + + See Also + ======== + + AlgebraicNumber + """ + return AlgebraicNumber( + (self.minpoly, self.root), coeffs=coeffs, alias=self.alias) + + @property + def is_primitive_element(self): + r""" + Say whether this algebraic number $\alpha \in \mathbb{Q}(\theta)$ is + equal to the primitive element $\theta$ for its field. + """ + c = self.coeffs() + # Second case occurs if self.minpoly is linear: + return c == [1, 0] or c == [self.root] + + def primitive_element(self): + r""" + Get the primitive element $\theta$ for the number field + $\mathbb{Q}(\theta)$ to which this algebraic number $\alpha$ belongs. + + Returns + ======= + + AlgebraicNumber + + """ + if self.is_primitive_element: + return self + return self.field_element([1, 0]) + + def to_primitive_element(self, radicals=True): + r""" + Convert ``self`` to an :py:class:`~.AlgebraicNumber` instance that is + equal to its own primitive element. + + Explanation + =========== + + If we represent $\alpha \in \mathbb{Q}(\theta)$, $\alpha \neq \theta$, + construct a new :py:class:`~.AlgebraicNumber` that represents + $\alpha \in \mathbb{Q}(\alpha)$. + + Examples + ======== + + >>> from sympy import sqrt, to_number_field + >>> from sympy.abc import x + >>> a = to_number_field(sqrt(2), sqrt(2) + sqrt(3)) + + The :py:class:`~.AlgebraicNumber` ``a`` represents the number + $\sqrt{2}$ in the field $\mathbb{Q}(\sqrt{2} + \sqrt{3})$. Rendering + ``a`` as a polynomial, + + >>> a.as_poly().as_expr(x) + x**3/2 - 9*x/2 + + reflects the fact that $\sqrt{2} = \theta^3/2 - 9 \theta/2$, where + $\theta = \sqrt{2} + \sqrt{3}$. + + ``a`` is not equal to its own primitive element. Its minpoly + + >>> a.minpoly.as_poly().as_expr(x) + x**4 - 10*x**2 + 1 + + is that of $\theta$. + + Converting to a primitive element, + + >>> a_prim = a.to_primitive_element() + >>> a_prim.minpoly.as_poly().as_expr(x) + x**2 - 2 + + we obtain an :py:class:`~.AlgebraicNumber` whose ``minpoly`` is that of + the number itself. + + Parameters + ========== + + radicals : boolean, optional (default=True) + If ``True``, then we will try to return an + :py:class:`~.AlgebraicNumber` whose ``root`` is an expression + in radicals. If that is not possible (or if *radicals* is + ``False``), ``root`` will be a :py:class:`~.ComplexRootOf`. + + Returns + ======= + + AlgebraicNumber + + See Also + ======== + + is_primitive_element + + """ + if self.is_primitive_element: + return self + m = self.minpoly_of_element() + r = self.to_root(radicals=radicals) + return AlgebraicNumber((m, r)) + + def minpoly_of_element(self): + r""" + Compute the minimal polynomial for this algebraic number. + + Explanation + =========== + + Recall that we represent an element $\alpha \in \mathbb{Q}(\theta)$. + Our instance attribute ``self.minpoly`` is the minimal polynomial for + our primitive element $\theta$. This method computes the minimal + polynomial for $\alpha$. + + """ + if self._own_minpoly is None: + if self.is_primitive_element: + self._own_minpoly = self.minpoly + else: + from sympy.polys.numberfields.minpoly import minpoly + theta = self.primitive_element() + self._own_minpoly = minpoly(self.as_expr(theta), polys=True) + return self._own_minpoly + + def to_root(self, radicals=True, minpoly=None): + """ + Convert to an :py:class:`~.Expr` that is not an + :py:class:`~.AlgebraicNumber`, specifically, either a + :py:class:`~.ComplexRootOf`, or, optionally and where possible, an + expression in radicals. + + Parameters + ========== + + radicals : boolean, optional (default=True) + If ``True``, then we will try to return the root as an expression + in radicals. If that is not possible, we will return a + :py:class:`~.ComplexRootOf`. + + minpoly : :py:class:`~.Poly` + If the minimal polynomial for `self` has been pre-computed, it can + be passed in order to save time. + + """ + if self.is_primitive_element and not isinstance(self.root, AlgebraicNumber): + return self.root + m = minpoly or self.minpoly_of_element() + roots = m.all_roots(radicals=radicals) + if len(roots) == 1: + return roots[0] + ex = self.as_expr() + for b in roots: + if m.same_root(b, ex): + return b + + +class RationalConstant(Rational): + """ + Abstract base class for rationals with specific behaviors + + Derived classes must define class attributes p and q and should probably all + be singletons. + """ + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + +class IntegerConstant(Integer): + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + +class Zero(IntegerConstant, metaclass=Singleton): + """The number zero. + + Zero is a singleton, and can be accessed by ``S.Zero`` + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(0) is S.Zero + True + >>> 1/S.Zero + zoo + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Zero + """ + + p = 0 + q = 1 + is_positive = False + is_negative = False + is_zero = True + is_number = True + is_comparable = True + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.Zero + + @staticmethod + def __neg__(): + return S.Zero + + def _eval_power(self, expt): + if expt.is_extended_positive: + return self + if expt.is_extended_negative: + return S.ComplexInfinity + if expt.is_extended_real is False: + return S.NaN + if expt.is_zero: + return S.One + + # infinities are already handled with pos and neg + # tests above; now throw away leading numbers on Mul + # exponent since 0**-x = zoo**x even when x == 0 + coeff, terms = expt.as_coeff_Mul() + if coeff.is_negative: + return S.ComplexInfinity**terms + if coeff is not S.One: # there is a Number to discard + return self**terms + + def _eval_order(self, *symbols): + # Order(0,x) -> 0 + return self + + def __bool__(self): + return False + + +class One(IntegerConstant, metaclass=Singleton): + """The number one. + + One is a singleton, and can be accessed by ``S.One``. + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(1) is S.One + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/1_%28number%29 + """ + is_number = True + is_positive = True + + p = 1 + q = 1 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.One + + @staticmethod + def __neg__(): + return S.NegativeOne + + def _eval_power(self, expt): + return self + + def _eval_order(self, *symbols): + return + + @staticmethod + def factors(limit=None, use_trial=True, use_rho=False, use_pm1=False, + verbose=False, visual=False): + if visual: + return S.One + else: + return {} + + +class NegativeOne(IntegerConstant, metaclass=Singleton): + """The number negative one. + + NegativeOne is a singleton, and can be accessed by ``S.NegativeOne``. + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(-1) is S.NegativeOne + True + + See Also + ======== + + One + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/%E2%88%921_%28number%29 + + """ + is_number = True + + p = -1 + q = 1 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.One + + @staticmethod + def __neg__(): + return S.One + + def _eval_power(self, expt): + if expt.is_odd: + return S.NegativeOne + if expt.is_even: + return S.One + if isinstance(expt, Number): + if isinstance(expt, Float): + return Float(-1.0)**expt + if expt is S.NaN: + return S.NaN + if expt in (S.Infinity, S.NegativeInfinity): + return S.NaN + if expt is S.Half: + return S.ImaginaryUnit + if isinstance(expt, Rational): + if expt.q == 2: + return S.ImaginaryUnit**Integer(expt.p) + i, r = divmod(expt.p, expt.q) + if i: + return self**i*self**Rational(r, expt.q) + return + + +class Half(RationalConstant, metaclass=Singleton): + """The rational number 1/2. + + Half is a singleton, and can be accessed by ``S.Half``. + + Examples + ======== + + >>> from sympy import S, Rational + >>> Rational(1, 2) is S.Half + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/One_half + """ + is_number = True + + p = 1 + q = 2 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.Half + + +class Infinity(Number, metaclass=Singleton): + r"""Positive infinite quantity. + + Explanation + =========== + + In real analysis the symbol `\infty` denotes an unbounded + limit: `x\to\infty` means that `x` grows without bound. + + Infinity is often used not only to define a limit but as a value + in the affinely extended real number system. Points labeled `+\infty` + and `-\infty` can be added to the topological space of the real numbers, + producing the two-point compactification of the real numbers. Adding + algebraic properties to this gives us the extended real numbers. + + Infinity is a singleton, and can be accessed by ``S.Infinity``, + or can be imported as ``oo``. + + Examples + ======== + + >>> from sympy import oo, exp, limit, Symbol + >>> 1 + oo + oo + >>> 42/oo + 0 + >>> x = Symbol('x') + >>> limit(exp(x), x, oo) + oo + + See Also + ======== + + NegativeInfinity, NaN + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Infinity + """ + + is_commutative = True + is_number = True + is_complex = False + is_extended_real = True + is_infinite = True + is_comparable = True + is_extended_positive = True + is_prime = False + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\infty" + + def _eval_subs(self, old, new): + if self == old: + return new + + def _eval_evalf(self, prec=None): + return Float('inf') + + def evalf(self, prec=None, **options): + return self._eval_evalf(prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.NegativeInfinity, S.NaN): + return S.NaN + return self + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.Infinity, S.NaN): + return S.NaN + return self + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + return (-self).__add__(other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other.is_zero or other is S.NaN: + return S.NaN + if other.is_extended_positive: + return self + return S.NegativeInfinity + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.Infinity or \ + other is S.NegativeInfinity or \ + other is S.NaN: + return S.NaN + if other.is_extended_nonnegative: + return self + return S.NegativeInfinity + return Number.__truediv__(self, other) + + def __abs__(self): + return S.Infinity + + def __neg__(self): + return S.NegativeInfinity + + def _eval_power(self, expt): + """ + ``expt`` is symbolic object but not equal to 0 or 1. + + ================ ======= ============================== + Expression Result Notes + ================ ======= ============================== + ``oo ** nan`` ``nan`` + ``oo ** -p`` ``0`` ``p`` is number, ``oo`` + ================ ======= ============================== + + See Also + ======== + Pow + NaN + NegativeInfinity + + """ + if expt.is_extended_positive: + return S.Infinity + if expt.is_extended_negative: + return S.Zero + if expt is S.NaN: + return S.NaN + if expt is S.ComplexInfinity: + return S.NaN + if expt.is_extended_real is False and expt.is_number: + from sympy.functions.elementary.complexes import re + expt_real = re(expt) + if expt_real.is_positive: + return S.ComplexInfinity + if expt_real.is_negative: + return S.Zero + if expt_real.is_zero: + return S.NaN + + return self**expt.evalf() + + def _as_mpf_val(self, prec): + return mlib.finf + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + return other is S.Infinity or other == float('inf') + + def __ne__(self, other): + return other is not S.Infinity and other != float('inf') + + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if not isinstance(other, Expr): + return NotImplemented + return S.NaN + + __rmod__ = __mod__ + + def floor(self): + return self + + def ceiling(self): + return self + +oo = S.Infinity + + +class NegativeInfinity(Number, metaclass=Singleton): + """Negative infinite quantity. + + NegativeInfinity is a singleton, and can be accessed + by ``S.NegativeInfinity``. + + See Also + ======== + + Infinity + """ + + is_extended_real = True + is_complex = False + is_commutative = True + is_infinite = True + is_comparable = True + is_extended_negative = True + is_number = True + is_prime = False + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"-\infty" + + def _eval_subs(self, old, new): + if self == old: + return new + + def _eval_evalf(self, prec=None): + return Float('-inf') + + def evalf(self, prec=None, **options): + return self._eval_evalf(prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.Infinity, S.NaN): + return S.NaN + return self + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.NegativeInfinity, S.NaN): + return S.NaN + return self + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + return (-self).__add__(other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other.is_zero or other is S.NaN: + return S.NaN + if other.is_extended_positive: + return self + return S.Infinity + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.Infinity or \ + other is S.NegativeInfinity or \ + other is S.NaN: + return S.NaN + if other.is_extended_nonnegative: + return self + return S.Infinity + return Number.__truediv__(self, other) + + def __abs__(self): + return S.Infinity + + def __neg__(self): + return S.Infinity + + def _eval_power(self, expt): + """ + ``expt`` is symbolic object but not equal to 0 or 1. + + ================ ======= ============================== + Expression Result Notes + ================ ======= ============================== + ``(-oo) ** nan`` ``nan`` + ``(-oo) ** oo`` ``nan`` + ``(-oo) ** -oo`` ``nan`` + ``(-oo) ** e`` ``oo`` ``e`` is positive even integer + ``(-oo) ** o`` ``-oo`` ``o`` is positive odd integer + ================ ======= ============================== + + See Also + ======== + + Infinity + Pow + NaN + + """ + if expt.is_number: + if expt is S.NaN or \ + expt is S.Infinity or \ + expt is S.NegativeInfinity: + return S.NaN + + if isinstance(expt, Integer) and expt.is_extended_positive: + if expt.is_odd: + return S.NegativeInfinity + else: + return S.Infinity + + inf_part = S.Infinity**expt + s_part = S.NegativeOne**expt + if inf_part == 0 and s_part.is_finite: + return inf_part + if (inf_part is S.ComplexInfinity and + s_part.is_finite and not s_part.is_zero): + return S.ComplexInfinity + return s_part*inf_part + + def _as_mpf_val(self, prec): + return mlib.fninf + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + return other is S.NegativeInfinity or other == float('-inf') + + def __ne__(self, other): + return other is not S.NegativeInfinity and other != float('-inf') + + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if not isinstance(other, Expr): + return NotImplemented + return S.NaN + + __rmod__ = __mod__ + + def floor(self): + return self + + def ceiling(self): + return self + + def as_powers_dict(self): + return {S.NegativeOne: 1, S.Infinity: 1} + + +class NaN(Number, metaclass=Singleton): + """ + Not a Number. + + Explanation + =========== + + This serves as a place holder for numeric values that are indeterminate. + Most operations on NaN, produce another NaN. Most indeterminate forms, + such as ``0/0`` or ``oo - oo` produce NaN. Two exceptions are ``0**0`` + and ``oo**0``, which all produce ``1`` (this is consistent with Python's + float). + + NaN is loosely related to floating point nan, which is defined in the + IEEE 754 floating point standard, and corresponds to the Python + ``float('nan')``. Differences are noted below. + + NaN is mathematically not equal to anything else, even NaN itself. This + explains the initially counter-intuitive results with ``Eq`` and ``==`` in + the examples below. + + NaN is not comparable so inequalities raise a TypeError. This is in + contrast with floating point nan where all inequalities are false. + + NaN is a singleton, and can be accessed by ``S.NaN``, or can be imported + as ``nan``. + + Examples + ======== + + >>> from sympy import nan, S, oo, Eq + >>> nan is S.NaN + True + >>> oo - oo + nan + >>> nan + 1 + nan + >>> Eq(nan, nan) # mathematical equality + False + >>> nan == nan # structural equality + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/NaN + + """ + is_commutative = True + is_extended_real = None + is_real = None + is_rational = None + is_algebraic = None + is_transcendental = None + is_integer = None + is_comparable = False + is_finite = None + is_zero = None + is_prime = None + is_positive = None + is_negative = None + is_number = True + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\text{NaN}" + + def __neg__(self): + return self + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + return self + + def floor(self): + return self + + def ceiling(self): + return self + + def _as_mpf_val(self, prec): + return _mpf_nan + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + # NaN is structurally equal to another NaN + return other is S.NaN + + def __ne__(self, other): + return other is not S.NaN + + # Expr will _sympify and raise TypeError + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + +nan = S.NaN + +@dispatch(NaN, Expr) # type:ignore +def _eval_is_eq(a, b): # noqa:F811 + return False + + +class ComplexInfinity(AtomicExpr, metaclass=Singleton): + r"""Complex infinity. + + Explanation + =========== + + In complex analysis the symbol `\tilde\infty`, called "complex + infinity", represents a quantity with infinite magnitude, but + undetermined complex phase. + + ComplexInfinity is a singleton, and can be accessed by + ``S.ComplexInfinity``, or can be imported as ``zoo``. + + Examples + ======== + + >>> from sympy import zoo + >>> zoo + 42 + zoo + >>> 42/zoo + 0 + >>> zoo + zoo + nan + >>> zoo*zoo + zoo + + See Also + ======== + + Infinity + """ + + is_commutative = True + is_infinite = True + is_number = True + is_prime = False + is_complex = False + is_extended_real = False + + kind = NumberKind + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\tilde{\infty}" + + @staticmethod + def __abs__(): + return S.Infinity + + def floor(self): + return self + + def ceiling(self): + return self + + @staticmethod + def __neg__(): + return S.ComplexInfinity + + def _eval_power(self, expt): + if expt is S.ComplexInfinity: + return S.NaN + + if isinstance(expt, Number): + if expt.is_zero: + return S.NaN + else: + if expt.is_positive: + return S.ComplexInfinity + else: + return S.Zero + + +zoo = S.ComplexInfinity + + +class NumberSymbol(AtomicExpr): + + is_commutative = True + is_finite = True + is_number = True + + __slots__ = () + + is_NumberSymbol = True + + kind = NumberKind + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def approximation(self, number_cls): + """ Return an interval with number_cls endpoints + that contains the value of NumberSymbol. + If not implemented, then return None. + """ + + def _eval_evalf(self, prec): + return Float._new(self._as_mpf_val(prec), prec) + + def __eq__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if self is other: + return True + if other.is_Number and self.is_irrational: + return False + + return False # NumberSymbol != non-(Number|self) + + def __ne__(self, other): + return not self == other + + def __le__(self, other): + if self is other: + return S.true + return Expr.__le__(self, other) + + def __ge__(self, other): + if self is other: + return S.true + return Expr.__ge__(self, other) + + def __int__(self): + # subclass with appropriate return value + raise NotImplementedError + + def __hash__(self): + return super().__hash__() + + +class Exp1(NumberSymbol, metaclass=Singleton): + r"""The `e` constant. + + Explanation + =========== + + The transcendental number `e = 2.718281828\ldots` is the base of the + natural logarithm and of the exponential function, `e = \exp(1)`. + Sometimes called Euler's number or Napier's constant. + + Exp1 is a singleton, and can be accessed by ``S.Exp1``, + or can be imported as ``E``. + + Examples + ======== + + >>> from sympy import exp, log, E + >>> E is exp(1) + True + >>> log(E) + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/E_%28mathematical_constant%29 + """ + + is_real = True + is_positive = True + is_negative = False # XXX Forces is_negative/is_nonnegative + is_irrational = True + is_number = True + is_algebraic = False + is_transcendental = True + + __slots__ = () + + def _latex(self, printer): + return r"e" + + @staticmethod + def __abs__(): + return S.Exp1 + + def __int__(self): + return 2 + + def _as_mpf_val(self, prec): + return mpf_e(prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (Integer(2), Integer(3)) + elif issubclass(number_cls, Rational): + pass + + def _eval_power(self, expt): + if global_parameters.exp_is_pow: + return self._eval_power_exp_is_pow(expt) + else: + from sympy.functions.elementary.exponential import exp + return exp(expt) + + def _eval_power_exp_is_pow(self, arg): + if arg.is_Number: + if arg is oo: + return oo + elif arg == -oo: + return S.Zero + from sympy.functions.elementary.exponential import log + if isinstance(arg, log): + return arg.args[0] + + # don't autoexpand Pow or Mul (see the issue 3351): + elif not arg.is_Add: + Ioo = I*oo + if arg in [Ioo, -Ioo]: + return nan + + coeff = arg.coeff(pi*I) + if coeff: + if (2*coeff).is_integer: + if coeff.is_even: + return S.One + elif coeff.is_odd: + return S.NegativeOne + elif (coeff + S.Half).is_even: + return -I + elif (coeff + S.Half).is_odd: + return I + elif coeff.is_Rational: + ncoeff = coeff % 2 # restrict to [0, 2pi) + if ncoeff > 1: # restrict to (-pi, pi] + ncoeff -= 2 + if ncoeff != coeff: + return S.Exp1**(ncoeff*S.Pi*S.ImaginaryUnit) + + # Warning: code in risch.py will be very sensitive to changes + # in this (see DifferentialExtension). + + # look for a single log factor + + coeff, terms = arg.as_coeff_Mul() + + # but it can't be multiplied by oo + if coeff in (oo, -oo): + return + + coeffs, log_term = [coeff], None + for term in Mul.make_args(terms): + if isinstance(term, log): + if log_term is None: + log_term = term.args[0] + else: + return + elif term.is_comparable: + coeffs.append(term) + else: + return + + return log_term**Mul(*coeffs) if log_term else None + elif arg.is_Add: + out = [] + add = [] + argchanged = False + for a in arg.args: + if a is S.One: + add.append(a) + continue + newa = self**a + if isinstance(newa, Pow) and newa.base is self: + if newa.exp != a: + add.append(newa.exp) + argchanged = True + else: + add.append(a) + else: + out.append(newa) + if out or argchanged: + return Mul(*out)*Pow(self, Add(*add), evaluate=False) + elif arg.is_Matrix: + return arg.exp() + + def _eval_rewrite_as_sin(self, **kwargs): + from sympy.functions.elementary.trigonometric import sin + return sin(I + S.Pi/2) - I*sin(I) + + def _eval_rewrite_as_cos(self, **kwargs): + from sympy.functions.elementary.trigonometric import cos + return cos(I) + I*cos(I + S.Pi/2) + +E = S.Exp1 + + +class Pi(NumberSymbol, metaclass=Singleton): + r"""The `\pi` constant. + + Explanation + =========== + + The transcendental number `\pi = 3.141592654\ldots` represents the ratio + of a circle's circumference to its diameter, the area of the unit circle, + the half-period of trigonometric functions, and many other things + in mathematics. + + Pi is a singleton, and can be accessed by ``S.Pi``, or can + be imported as ``pi``. + + Examples + ======== + + >>> from sympy import S, pi, oo, sin, exp, integrate, Symbol + >>> S.Pi + pi + >>> pi > 3 + True + >>> pi.is_irrational + True + >>> x = Symbol('x') + >>> sin(x + 2*pi) + sin(x) + >>> integrate(exp(-x**2), (x, -oo, oo)) + sqrt(pi) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Pi + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = False + is_transcendental = True + + __slots__ = () + + def _latex(self, printer): + return r"\pi" + + @staticmethod + def __abs__(): + return S.Pi + + def __int__(self): + return 3 + + def _as_mpf_val(self, prec): + return mpf_pi(prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (Integer(3), Integer(4)) + elif issubclass(number_cls, Rational): + return (Rational(223, 71, 1), Rational(22, 7, 1)) + +pi = S.Pi + + +class GoldenRatio(NumberSymbol, metaclass=Singleton): + r"""The golden ratio, `\phi`. + + Explanation + =========== + + `\phi = \frac{1 + \sqrt{5}}{2}` is an algebraic number. Two quantities + are in the golden ratio if their ratio is the same as the ratio of + their sum to the larger of the two quantities, i.e. their maximum. + + GoldenRatio is a singleton, and can be accessed by ``S.GoldenRatio``. + + Examples + ======== + + >>> from sympy import S + >>> S.GoldenRatio > 1 + True + >>> S.GoldenRatio.expand(func=True) + 1/2 + sqrt(5)/2 + >>> S.GoldenRatio.is_irrational + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Golden_ratio + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = True + is_transcendental = False + + __slots__ = () + + def _latex(self, printer): + return r"\phi" + + def __int__(self): + return 1 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + rv = mlib.from_man_exp(phi_fixed(prec + 10), -prec - 10) + return mpf_norm(rv, prec) + + def _eval_expand_func(self, **hints): + from sympy.functions.elementary.miscellaneous import sqrt + return S.Half + S.Half*sqrt(5) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.One, Rational(2)) + elif issubclass(number_cls, Rational): + pass + + _eval_rewrite_as_sqrt = _eval_expand_func + + +class TribonacciConstant(NumberSymbol, metaclass=Singleton): + r"""The tribonacci constant. + + Explanation + =========== + + The tribonacci numbers are like the Fibonacci numbers, but instead + of starting with two predetermined terms, the sequence starts with + three predetermined terms and each term afterwards is the sum of the + preceding three terms. + + The tribonacci constant is the ratio toward which adjacent tribonacci + numbers tend. It is a root of the polynomial `x^3 - x^2 - x - 1 = 0`, + and also satisfies the equation `x + x^{-3} = 2`. + + TribonacciConstant is a singleton, and can be accessed + by ``S.TribonacciConstant``. + + Examples + ======== + + >>> from sympy import S + >>> S.TribonacciConstant > 1 + True + >>> S.TribonacciConstant.expand(func=True) + 1/3 + (19 - 3*sqrt(33))**(1/3)/3 + (3*sqrt(33) + 19)**(1/3)/3 + >>> S.TribonacciConstant.is_irrational + True + >>> S.TribonacciConstant.n(20) + 1.8392867552141611326 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Generalizations_of_Fibonacci_numbers#Tribonacci_numbers + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = True + is_transcendental = False + + __slots__ = () + + def _latex(self, printer): + return r"\text{TribonacciConstant}" + + def __int__(self): + return 1 + + def _as_mpf_val(self, prec): + return self._eval_evalf(prec)._mpf_ + + def _eval_evalf(self, prec): + rv = self._eval_expand_func(function=True)._eval_evalf(prec + 4) + return Float(rv, precision=prec) + + def _eval_expand_func(self, **hints): + from sympy.functions.elementary.miscellaneous import cbrt, sqrt + return (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.One, Rational(2)) + elif issubclass(number_cls, Rational): + pass + + _eval_rewrite_as_sqrt = _eval_expand_func + + +class EulerGamma(NumberSymbol, metaclass=Singleton): + r"""The Euler-Mascheroni constant. + + Explanation + =========== + + `\gamma = 0.5772157\ldots` (also called Euler's constant) is a mathematical + constant recurring in analysis and number theory. It is defined as the + limiting difference between the harmonic series and the + natural logarithm: + + .. math:: \gamma = \lim\limits_{n\to\infty} + \left(\sum\limits_{k=1}^n\frac{1}{k} - \ln n\right) + + EulerGamma is a singleton, and can be accessed by ``S.EulerGamma``. + + Examples + ======== + + >>> from sympy import S + >>> S.EulerGamma.is_irrational + >>> S.EulerGamma > 0 + True + >>> S.EulerGamma > 1 + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Mascheroni_constant + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = None + is_number = True + + __slots__ = () + + def _latex(self, printer): + return r"\gamma" + + def __int__(self): + return 0 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + v = mlib.libhyper.euler_fixed(prec + 10) + rv = mlib.from_man_exp(v, -prec - 10) + return mpf_norm(rv, prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.Zero, S.One) + elif issubclass(number_cls, Rational): + return (S.Half, Rational(3, 5, 1)) + + +class Catalan(NumberSymbol, metaclass=Singleton): + r"""Catalan's constant. + + Explanation + =========== + + $G = 0.91596559\ldots$ is given by the infinite series + + .. math:: G = \sum_{k=0}^{\infty} \frac{(-1)^k}{(2k+1)^2} + + Catalan is a singleton, and can be accessed by ``S.Catalan``. + + Examples + ======== + + >>> from sympy import S + >>> S.Catalan.is_irrational + >>> S.Catalan > 0 + True + >>> S.Catalan > 1 + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Catalan%27s_constant + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = None + is_number = True + + __slots__ = () + + def __int__(self): + return 0 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + v = mlib.catalan_fixed(prec + 10) + rv = mlib.from_man_exp(v, -prec - 10) + return mpf_norm(rv, prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.Zero, S.One) + elif issubclass(number_cls, Rational): + return (Rational(9, 10, 1), S.One) + + def _eval_rewrite_as_Sum(self, k_sym=None, symbols=None, **hints): + if (k_sym is not None) or (symbols is not None): + return self + from .symbol import Dummy + from sympy.concrete.summations import Sum + k = Dummy('k', integer=True, nonnegative=True) + return Sum(S.NegativeOne**k / (2*k+1)**2, (k, 0, S.Infinity)) + + def _latex(self, printer): + return "G" + + +class ImaginaryUnit(AtomicExpr, metaclass=Singleton): + r"""The imaginary unit, `i = \sqrt{-1}`. + + I is a singleton, and can be accessed by ``S.I``, or can be + imported as ``I``. + + Examples + ======== + + >>> from sympy import I, sqrt + >>> sqrt(-1) + I + >>> I*I + -1 + >>> 1/I + -I + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Imaginary_unit + """ + + is_commutative = True + is_imaginary = True + is_finite = True + is_number = True + is_algebraic = True + is_transcendental = False + + kind = NumberKind + + __slots__ = () + + def _latex(self, printer): + return printer._settings['imaginary_unit_latex'] + + @staticmethod + def __abs__(): + return S.One + + def _eval_evalf(self, prec): + return self + + def _eval_conjugate(self): + return -S.ImaginaryUnit + + def _eval_power(self, expt): + """ + b is I = sqrt(-1) + e is symbolic object but not equal to 0, 1 + + I**r -> (-1)**(r/2) -> exp(r/2*Pi*I) -> sin(Pi*r/2) + cos(Pi*r/2)*I, r is decimal + I**0 mod 4 -> 1 + I**1 mod 4 -> I + I**2 mod 4 -> -1 + I**3 mod 4 -> -I + """ + + if isinstance(expt, Integer): + expt = expt % 4 + if expt == 0: + return S.One + elif expt == 1: + return S.ImaginaryUnit + elif expt == 2: + return S.NegativeOne + elif expt == 3: + return -S.ImaginaryUnit + if isinstance(expt, Rational): + i, r = divmod(expt, 2) + rv = Pow(S.ImaginaryUnit, r, evaluate=False) + if i % 2: + return Mul(S.NegativeOne, rv, evaluate=False) + return rv + + def as_base_exp(self): + return S.NegativeOne, S.Half + + @property + def _mpc_(self): + return (Float(0)._mpf_, Float(1)._mpf_) + + +I = S.ImaginaryUnit + + +def int_valued(x): + """return True only for a literal Number whose internal + representation as a fraction has a denominator of 1, + else False, i.e. integer, with no fractional part. + """ + if isinstance(x, (SYMPY_INTS, int)): + return True + if type(x) is float: + return x.is_integer() + if isinstance(x, Integer): + return True + if isinstance(x, Float): + # x = s*m*2**p; _mpf_ = s,m,e,p + return x._mpf_[2] >= 0 + return False # or add new types to recognize + + +def equal_valued(x, y): + """Compare expressions treating plain floats as rationals. + + Examples + ======== + + >>> from sympy import S, symbols, Rational, Float + >>> from sympy.core.numbers import equal_valued + >>> equal_valued(1, 2) + False + >>> equal_valued(1, 1) + True + + In SymPy expressions with Floats compare unequal to corresponding + expressions with rationals: + + >>> x = symbols('x') + >>> x**2 == x**2.0 + False + + However an individual Float compares equal to a Rational: + + >>> Rational(1, 2) == Float(0.5) + False + + In a future version of SymPy this might change so that Rational and Float + compare unequal. This function provides the behavior currently expected of + ``==`` so that it could still be used if the behavior of ``==`` were to + change in future. + + >>> equal_valued(1, 1.0) # Float vs Rational + True + >>> equal_valued(S(1).n(3), S(1).n(5)) # Floats of different precision + True + + Explanation + =========== + + In future SymPy versions Float and Rational might compare unequal and floats + with different precisions might compare unequal. In that context a function + is needed that can check if a number is equal to 1 or 0 etc. The idea is + that instead of testing ``if x == 1:`` if we want to accept floats like + ``1.0`` as well then the test can be written as ``if equal_valued(x, 1):`` + or ``if equal_valued(x, 2):``. Since this function is intended to be used + in situations where one or both operands are expected to be concrete + numbers like 1 or 0 the function does not recurse through the args of any + compound expression to compare any nested floats. + + References + ========== + + .. [1] https://github.com/sympy/sympy/pull/20033 + """ + x = _sympify(x) + y = _sympify(y) + + # Handle everything except Float/Rational first + if not x.is_Float and not y.is_Float: + return x == y + elif x.is_Float and y.is_Float: + # Compare values without regard for precision + return x._mpf_ == y._mpf_ + elif x.is_Float: + x, y = y, x + if not x.is_Rational: + return False + + # Now y is Float and x is Rational. A simple approach at this point would + # just be x == Rational(y) but if y has a large exponent creating a + # Rational could be prohibitively expensive. + + sign, man, exp, _ = y._mpf_ + p, q = x.p, x.q + + if sign: + man = -man + + if exp == 0: + # y odd integer + return q == 1 and man == p + elif exp > 0: + # y even integer + if q != 1: + return False + if p.bit_length() != man.bit_length() + exp: + return False + return man << exp == p + else: + # y non-integer. Need p == man and q == 2**-exp + if p != man: + return False + neg_exp = -exp + if q.bit_length() - 1 != neg_exp: + return False + return (1 << neg_exp) == q + + +def all_close(expr1, expr2, rtol=1e-5, atol=1e-8): + """Return True if expr1 and expr2 are numerically close. + + The expressions must have the same structure, but any Rational, Integer, or + Float numbers they contain are compared approximately using rtol and atol. + Any other parts of expressions are compared exactly. However, allowance is + made to allow for the additive and multiplicative identities. + + Relative tolerance is measured with respect to expr2 so when used in + testing expr2 should be the expected correct answer. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x, y + >>> from sympy.core.numbers import all_close + >>> expr1 = 0.1*exp(x - y) + >>> expr2 = exp(x - y)/10 + >>> expr1 + 0.1*exp(x - y) + >>> expr2 + exp(x - y)/10 + >>> expr1 == expr2 + False + >>> all_close(expr1, expr2) + True + + Identities are automatically supplied: + + >>> all_close(x, x + 1e-10) + True + >>> all_close(x, 1.0*x) + True + >>> all_close(x, 1.0*x + 1e-10) + True + + """ + NUM_TYPES = (Rational, Float) + + def _all_close(obj1, obj2): + if type(obj1) == type(obj2) and isinstance(obj1, (list, tuple)): + if len(obj1) != len(obj2): + return False + return all(_all_close(e1, e2) for e1, e2 in zip(obj1, obj2)) + else: + return _all_close_expr(_sympify(obj1), _sympify(obj2)) + + def _all_close_expr(expr1, expr2): + num1 = isinstance(expr1, NUM_TYPES) + num2 = isinstance(expr2, NUM_TYPES) + if num1 != num2: + return False + elif num1: + return _close_num(expr1, expr2) + if expr1.is_Add or expr1.is_Mul or expr2.is_Add or expr2.is_Mul: + return _all_close_ac(expr1, expr2) + if expr1.func != expr2.func or len(expr1.args) != len(expr2.args): + return False + args = zip(expr1.args, expr2.args) + return all(_all_close_expr(a1, a2) for a1, a2 in args) + + def _close_num(num1, num2): + return bool(abs(num1 - num2) <= atol + rtol*abs(num2)) + + def _all_close_ac(expr1, expr2): + # compare expressions with associative commutative operators for + # approximate equality by seeing that all terms have equivalent + # coefficients (which are always Rational or Float) + if expr1.is_Mul or expr2.is_Mul: + # as_coeff_mul automatically will supply coeff of 1 + c1, e1 = expr1.as_coeff_mul(rational=False) + c2, e2 = expr2.as_coeff_mul(rational=False) + if not _close_num(c1, c2): + return False + s1 = set(e1) + s2 = set(e2) + common = s1 & s2 + s1 -= common + s2 -= common + if not s1: + return True + if not any(i.has(Float) for j in (s1, s2) for i in j): + return False + # factors might not be matching, e.g. + # x != x**1.0, exp(x) != exp(1.0*x), etc... + s1 = [i.as_base_exp() for i in ordered(s1)] + s2 = [i.as_base_exp() for i in ordered(s2)] + unmatched = list(range(len(s1))) + for be1 in s1: + for i in unmatched: + be2 = s2[i] + if _all_close(be1, be2): + unmatched.remove(i) + break + else: + return False + return not(unmatched) + assert expr1.is_Add or expr2.is_Add + cd1 = expr1.as_coefficients_dict() + cd2 = expr2.as_coefficients_dict() + # this test will assure that the key of 1 is in + # each dict and that they have equal values + if not _close_num(cd1[1], cd2[1]): + return False + if len(cd1) != len(cd2): + return False + for k in list(cd1): + if k in cd2: + if not _close_num(cd1.pop(k), cd2.pop(k)): + return False + # k (or a close version in cd2) might have + # Floats in a factor of the term which will + # be handled below + else: + if not cd1: + return True + for k1 in cd1: + for k2 in cd2: + if _all_close_expr(k1, k2): + # found a matching key + # XXX there could be a corner case where + # more than 1 might match and the numbers are + # such that one is better than the other + # that is not being considered here + if not _close_num(cd1[k1], cd2[k2]): + return False + break + else: + # no key matched + return False + return True + + return _all_close(expr1, expr2) + + +@dispatch(Tuple, Number) # type:ignore +def _eval_is_eq(self, other): # noqa: F811 + return False + + +def sympify_fractions(f): + return Rational._new(f.numerator, f.denominator, 1) + +_sympy_converter[fractions.Fraction] = sympify_fractions + + +if gmpy is not None: + + def sympify_mpz(x): + return Integer(int(x)) + + def sympify_mpq(x): + return Rational(int(x.numerator), int(x.denominator)) + + _sympy_converter[type(gmpy.mpz(1))] = sympify_mpz + _sympy_converter[type(gmpy.mpq(1, 2))] = sympify_mpq + + +if flint is not None: + + def sympify_fmpz(x): + return Integer(int(x)) + + def sympify_fmpq(x): + return Rational(int(x.numerator), int(x.denominator)) + + _sympy_converter[type(flint.fmpz(1))] = sympify_fmpz + _sympy_converter[type(flint.fmpq(1, 2))] = sympify_fmpq + + +def sympify_mpmath(x): + return Expr._from_mpmath(x, x.context.prec) + +_sympy_converter[mpnumeric] = sympify_mpmath + + +def sympify_complex(a): + real, imag = list(map(sympify, (a.real, a.imag))) + return real + S.ImaginaryUnit*imag + +_sympy_converter[complex] = sympify_complex + +from .power import Pow +from .mul import Mul +Mul.identity = One() +from .add import Add +Add.identity = Zero() + + +def _register_classes(): + numbers.Number.register(Number) + numbers.Real.register(Float) + numbers.Rational.register(Rational) + numbers.Integral.register(Integer) + +_register_classes() + +_illegal = (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/operations.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/operations.py new file mode 100644 index 0000000000000000000000000000000000000000..70d22127eb4d3f69fc5e304ab38f5cce9c4bb551 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/operations.py @@ -0,0 +1,741 @@ +from __future__ import annotations + +from typing import overload, TYPE_CHECKING + +from operator import attrgetter +from collections import defaultdict + +from sympy.utilities.exceptions import sympy_deprecation_warning + +from .sympify import _sympify as _sympify_, sympify +from .basic import Basic +from .cache import cacheit +from .sorting import ordered +from .logic import fuzzy_and +from .parameters import global_parameters +from sympy.utilities.iterables import sift +from sympy.multipledispatch.dispatcher import (Dispatcher, + ambiguity_register_error_ignore_dup, + str_signature, RaiseNotImplementedError) + + +if TYPE_CHECKING: + from sympy.core.expr import Expr + from sympy.core.add import Add + from sympy.core.mul import Mul + from sympy.logic.boolalg import Boolean, And, Or + + +class AssocOp(Basic): + """ Associative operations, can separate noncommutative and + commutative parts. + + (a op b) op c == a op (b op c) == a op b op c. + + Base class for Add and Mul. + + This is an abstract base class, concrete derived classes must define + the attribute `identity`. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Parameters + ========== + + *args : + Arguments which are operated + + evaluate : bool, optional + Evaluate the operation. If not passed, refer to ``global_parameters.evaluate``. + """ + + # for performance reason, we don't let is_commutative go to assumptions, + # and keep it right here + __slots__: tuple[str, ...] = ('is_commutative',) + + _args_type: type[Basic] | None = None + + @cacheit + def __new__(cls, *args, evaluate=None, _sympify=True): + # Allow faster processing by passing ``_sympify=False``, if all arguments + # are already sympified. + if _sympify: + args = list(map(_sympify_, args)) + + # Disallow non-Expr args in Add/Mul + typ = cls._args_type + if typ is not None: + from .relational import Relational + if any(isinstance(arg, Relational) for arg in args): + raise TypeError("Relational cannot be used in %s" % cls.__name__) + + # This should raise TypeError once deprecation period is over: + for arg in args: + if not isinstance(arg, typ): + sympy_deprecation_warning( + f""" + +Using non-Expr arguments in {cls.__name__} is deprecated (in this case, one of +the arguments has type {type(arg).__name__!r}). + +If you really did intend to use a multiplication or addition operation with +this object, use the * or + operator instead. + + """, + deprecated_since_version="1.7", + active_deprecations_target="non-expr-args-deprecated", + stacklevel=4, + ) + + if evaluate is None: + evaluate = global_parameters.evaluate + if not evaluate: + obj = cls._from_args(args) + obj = cls._exec_constructor_postprocessors(obj) + return obj + + args = [a for a in args if a is not cls.identity] + + if len(args) == 0: + return cls.identity + if len(args) == 1: + return args[0] + + c_part, nc_part, order_symbols = cls.flatten(args) + is_commutative = not nc_part + obj = cls._from_args(c_part + nc_part, is_commutative) + obj = cls._exec_constructor_postprocessors(obj) + + if order_symbols is not None: + from sympy.series.order import Order + return Order(obj, *order_symbols) + return obj + + @classmethod + def _from_args(cls, args, is_commutative=None): + """Create new instance with already-processed args. + If the args are not in canonical order, then a non-canonical + result will be returned, so use with caution. The order of + args may change if the sign of the args is changed.""" + if len(args) == 0: + return cls.identity + elif len(args) == 1: + return args[0] + + obj = super().__new__(cls, *args) + if is_commutative is None: + is_commutative = fuzzy_and(a.is_commutative for a in args) + obj.is_commutative = is_commutative + return obj + + def _new_rawargs(self, *args, reeval=True, **kwargs): + """Create new instance of own class with args exactly as provided by + caller but returning the self class identity if args is empty. + + Examples + ======== + + This is handy when we want to optimize things, e.g. + + >>> from sympy import Mul, S + >>> from sympy.abc import x, y + >>> e = Mul(3, x, y) + >>> e.args + (3, x, y) + >>> Mul(*e.args[1:]) + x*y + >>> e._new_rawargs(*e.args[1:]) # the same as above, but faster + x*y + + Note: use this with caution. There is no checking of arguments at + all. This is best used when you are rebuilding an Add or Mul after + simply removing one or more args. If, for example, modifications, + result in extra 1s being inserted they will show up in the result: + + >>> m = (x*y)._new_rawargs(S.One, x); m + 1*x + >>> m == x + False + >>> m.is_Mul + True + + Another issue to be aware of is that the commutativity of the result + is based on the commutativity of self. If you are rebuilding the + terms that came from a commutative object then there will be no + problem, but if self was non-commutative then what you are + rebuilding may now be commutative. + + Although this routine tries to do as little as possible with the + input, getting the commutativity right is important, so this level + of safety is enforced: commutativity will always be recomputed if + self is non-commutative and kwarg `reeval=False` has not been + passed. + """ + if reeval and self.is_commutative is False: + is_commutative = None + else: + is_commutative = self.is_commutative + return self._from_args(args, is_commutative) + + @classmethod + def flatten(cls, seq): + """Return seq so that none of the elements are of type `cls`. This is + the vanilla routine that will be used if a class derived from AssocOp + does not define its own flatten routine.""" + # apply associativity, no commutativity property is used + new_seq = [] + while seq: + o = seq.pop() + if o.__class__ is cls: # classes must match exactly + seq.extend(o.args) + else: + new_seq.append(o) + new_seq.reverse() + + # c_part, nc_part, order_symbols + return [], new_seq, None + + def _matches_commutative(self, expr, repl_dict=None, old=False): + """ + Matches Add/Mul "pattern" to an expression "expr". + + repl_dict ... a dictionary of (wild: expression) pairs, that get + returned with the results + + This function is the main workhorse for Add/Mul. + + Examples + ======== + + >>> from sympy import symbols, Wild, sin + >>> a = Wild("a") + >>> b = Wild("b") + >>> c = Wild("c") + >>> x, y, z = symbols("x y z") + >>> (a+sin(b)*c)._matches_commutative(x+sin(y)*z) + {a_: x, b_: y, c_: z} + + In the example above, "a+sin(b)*c" is the pattern, and "x+sin(y)*z" is + the expression. + + The repl_dict contains parts that were already matched. For example + here: + + >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z, repl_dict={a: x}) + {a_: x, b_: y, c_: z} + + the only function of the repl_dict is to return it in the + result, e.g. if you omit it: + + >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z) + {b_: y, c_: z} + + the "a: x" is not returned in the result, but otherwise it is + equivalent. + + """ + from .function import _coeff_isneg + # make sure expr is Expr if pattern is Expr + from .expr import Expr + if isinstance(self, Expr) and not isinstance(expr, Expr): + return None + + if repl_dict is None: + repl_dict = {} + + # handle simple patterns + if self == expr: + return repl_dict + + d = self._matches_simple(expr, repl_dict) + if d is not None: + return d + + # eliminate exact part from pattern: (2+a+w1+w2).matches(expr) -> (w1+w2).matches(expr-a-2) + from .function import WildFunction + from .symbol import Wild + wild_part, exact_part = sift(self.args, lambda p: + p.has(Wild, WildFunction) and not expr.has(p), + binary=True) + if not exact_part: + wild_part = list(ordered(wild_part)) + if self.is_Add: + # in addition to normal ordered keys, impose + # sorting on Muls with leading Number to put + # them in order + wild_part = sorted(wild_part, key=lambda x: + x.args[0] if x.is_Mul and x.args[0].is_Number else + 0) + else: + exact = self._new_rawargs(*exact_part) + free = expr.free_symbols + if free and (exact.free_symbols - free): + # there are symbols in the exact part that are not + # in the expr; but if there are no free symbols, let + # the matching continue + return None + newexpr = self._combine_inverse(expr, exact) + if not old and (expr.is_Add or expr.is_Mul): + check = newexpr + if _coeff_isneg(check): + check = -check + if check.count_ops() > expr.count_ops(): + return None + newpattern = self._new_rawargs(*wild_part) + return newpattern.matches(newexpr, repl_dict) + + # now to real work ;) + i = 0 + saw = set() + while expr not in saw: + saw.add(expr) + args = tuple(ordered(self.make_args(expr))) + if self.is_Add and expr.is_Add: + # in addition to normal ordered keys, impose + # sorting on Muls with leading Number to put + # them in order + args = tuple(sorted(args, key=lambda x: + x.args[0] if x.is_Mul and x.args[0].is_Number else + 0)) + expr_list = (self.identity,) + args + for last_op in reversed(expr_list): + for w in reversed(wild_part): + d1 = w.matches(last_op, repl_dict) + if d1 is not None: + d2 = self.xreplace(d1).matches(expr, d1) + if d2 is not None: + return d2 + + if i == 0: + if self.is_Mul: + # make e**i look like Mul + if expr.is_Pow and expr.exp.is_Integer: + from .mul import Mul + if expr.exp > 0: + expr = Mul(*[expr.base, expr.base**(expr.exp - 1)], evaluate=False) + else: + expr = Mul(*[1/expr.base, expr.base**(expr.exp + 1)], evaluate=False) + i += 1 + continue + + elif self.is_Add: + # make i*e look like Add + c, e = expr.as_coeff_Mul() + if abs(c) > 1: + from .add import Add + if c > 0: + expr = Add(*[e, (c - 1)*e], evaluate=False) + else: + expr = Add(*[-e, (c + 1)*e], evaluate=False) + i += 1 + continue + + # try collection on non-Wild symbols + from sympy.simplify.radsimp import collect + was = expr + did = set() + for w in reversed(wild_part): + c, w = w.as_coeff_mul(Wild) + free = c.free_symbols - did + if free: + did.update(free) + expr = collect(expr, free) + if expr != was: + i += 0 + continue + + break # if we didn't continue, there is nothing more to do + + return + + def _has_matcher(self): + """Helper for .has() that checks for containment of + subexpressions within an expr by using sets of args + of similar nodes, e.g. x + 1 in x + y + 1 checks + to see that {x, 1} & {x, y, 1} == {x, 1} + """ + def _ncsplit(expr): + # this is not the same as args_cnc because here + # we don't assume expr is a Mul -- hence deal with args -- + # and always return a set. + cpart, ncpart = sift(expr.args, + lambda arg: arg.is_commutative is True, binary=True) + return set(cpart), ncpart + + c, nc = _ncsplit(self) + cls = self.__class__ + + def is_in(expr): + if isinstance(expr, cls): + if expr == self: + return True + _c, _nc = _ncsplit(expr) + if (c & _c) == c: + if not nc: + return True + elif len(nc) <= len(_nc): + for i in range(len(_nc) - len(nc) + 1): + if _nc[i:i + len(nc)] == nc: + return True + return False + return is_in + + def _eval_evalf(self, prec): + """ + Evaluate the parts of self that are numbers; if the whole thing + was a number with no functions it would have been evaluated, but + it wasn't so we must judiciously extract the numbers and reconstruct + the object. This is *not* simply replacing numbers with evaluated + numbers. Numbers should be handled in the largest pure-number + expression as possible. So the code below separates ``self`` into + number and non-number parts and evaluates the number parts and + walks the args of the non-number part recursively (doing the same + thing). + """ + from .add import Add + from .mul import Mul + from .symbol import Symbol + from .function import AppliedUndef + if isinstance(self, (Mul, Add)): + x, tail = self.as_independent(Symbol, AppliedUndef) + # if x is an AssocOp Function then the _evalf below will + # call _eval_evalf (here) so we must break the recursion + if not (tail is self.identity or + isinstance(x, AssocOp) and x.is_Function or + x is self.identity and isinstance(tail, AssocOp)): + # here, we have a number so we just call to _evalf with prec; + # prec is not the same as n, it is the binary precision so + # that's why we don't call to evalf. + x = x._evalf(prec) if x is not self.identity else self.identity + args = [] + tail_args = tuple(self.func.make_args(tail)) + for a in tail_args: + # here we call to _eval_evalf since we don't know what we + # are dealing with and all other _eval_evalf routines should + # be doing the same thing (i.e. taking binary prec and + # finding the evalf-able args) + newa = a._eval_evalf(prec) + if newa is None: + args.append(a) + else: + args.append(newa) + return self.func(x, *args) + + # this is the same as above, but there were no pure-number args to + # deal with + args = [] + for a in self.args: + newa = a._eval_evalf(prec) + if newa is None: + args.append(a) + else: + args.append(newa) + return self.func(*args) + + @overload + @classmethod + def make_args(cls: type[Add], expr: Expr) -> tuple[Expr, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[Mul], expr: Expr) -> tuple[Expr, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[And], expr: Boolean) -> tuple[Boolean, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[Or], expr: Boolean) -> tuple[Boolean, ...]: ... # type: ignore + + @classmethod + def make_args(cls: type[Basic], expr: Basic) -> tuple[Basic, ...]: + """ + Return a sequence of elements `args` such that cls(*args) == expr + + Examples + ======== + + >>> from sympy import Symbol, Mul, Add + >>> x, y = map(Symbol, 'xy') + + >>> Mul.make_args(x*y) + (x, y) + >>> Add.make_args(x*y) + (x*y,) + >>> set(Add.make_args(x*y + y)) == set([y, x*y]) + True + + """ + if isinstance(expr, cls): + return expr.args + else: + return (sympify(expr),) + + def doit(self, **hints): + if hints.get('deep', True): + terms = [term.doit(**hints) for term in self.args] + else: + terms = self.args + return self.func(*terms, evaluate=True) + +class ShortCircuit(Exception): + pass + + +class LatticeOp(AssocOp): + """ + Join/meet operations of an algebraic lattice[1]. + + Explanation + =========== + + These binary operations are associative (op(op(a, b), c) = op(a, op(b, c))), + commutative (op(a, b) = op(b, a)) and idempotent (op(a, a) = op(a) = a). + Common examples are AND, OR, Union, Intersection, max or min. They have an + identity element (op(identity, a) = a) and an absorbing element + conventionally called zero (op(zero, a) = zero). + + This is an abstract base class, concrete derived classes must declare + attributes zero and identity. All defining properties are then respected. + + Examples + ======== + + >>> from sympy import Integer + >>> from sympy.core.operations import LatticeOp + >>> class my_join(LatticeOp): + ... zero = Integer(0) + ... identity = Integer(1) + >>> my_join(2, 3) == my_join(3, 2) + True + >>> my_join(2, my_join(3, 4)) == my_join(2, 3, 4) + True + >>> my_join(0, 1, 4, 2, 3, 4) + 0 + >>> my_join(1, 2) + 2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lattice_%28order%29 + """ + + is_commutative = True + + def __new__(cls, *args, **options): + args = (_sympify_(arg) for arg in args) + + try: + # /!\ args is a generator and _new_args_filter + # must be careful to handle as such; this + # is done so short-circuiting can be done + # without having to sympify all values + _args = frozenset(cls._new_args_filter(args)) + except ShortCircuit: + return sympify(cls.zero) + if not _args: + return sympify(cls.identity) + elif len(_args) == 1: + return set(_args).pop() + else: + # XXX in almost every other case for __new__, *_args is + # passed along, but the expectation here is for _args + obj = super(AssocOp, cls).__new__(cls, *ordered(_args)) + obj._argset = _args + return obj + + @classmethod + def _new_args_filter(cls, arg_sequence, call_cls=None): + """Generator filtering args""" + ncls = call_cls or cls + for arg in arg_sequence: + if arg == ncls.zero: + raise ShortCircuit(arg) + elif arg == ncls.identity: + continue + elif arg.func == ncls: + yield from arg.args + else: + yield arg + + @classmethod + def make_args(cls, expr): + """ + Return a set of args such that cls(*arg_set) == expr. + """ + if isinstance(expr, cls): + return expr._argset + else: + return frozenset([sympify(expr)]) + + +class AssocOpDispatcher: + """ + Handler dispatcher for associative operators + + .. notes:: + This approach is experimental, and can be replaced or deleted in the future. + See https://github.com/sympy/sympy/pull/19463. + + Explanation + =========== + + If arguments of different types are passed, the classes which handle the operation for each type + are collected. Then, a class which performs the operation is selected by recursive binary dispatching. + Dispatching relation can be registered by ``register_handlerclass`` method. + + Priority registration is unordered. You cannot make ``A*B`` and ``B*A`` refer to + different handler classes. All logic dealing with the order of arguments must be implemented + in the handler class. + + Examples + ======== + + >>> from sympy import Add, Expr, Symbol + >>> from sympy.core.add import add + + >>> class NewExpr(Expr): + ... @property + ... def _add_handler(self): + ... return NewAdd + >>> class NewAdd(NewExpr, Add): + ... pass + >>> add.register_handlerclass((Add, NewAdd), NewAdd) + + >>> a, b = Symbol('a'), NewExpr() + >>> add(a, b) == NewAdd(a, b) + True + + """ + def __init__(self, name, doc=None): + self.name = name + self.doc = doc + self.handlerattr = "_%s_handler" % name + self._handlergetter = attrgetter(self.handlerattr) + self._dispatcher = Dispatcher(name) + + def __repr__(self): + return "" % self.name + + def register_handlerclass(self, classes, typ, on_ambiguity=ambiguity_register_error_ignore_dup): + """ + Register the handler class for two classes, in both straight and reversed order. + + Paramteters + =========== + + classes : tuple of two types + Classes who are compared with each other. + + typ: + Class which is registered to represent *cls1* and *cls2*. + Handler method of *self* must be implemented in this class. + """ + if not len(classes) == 2: + raise RuntimeError( + "Only binary dispatch is supported, but got %s types: <%s>." % ( + len(classes), str_signature(classes) + )) + if len(set(classes)) == 1: + raise RuntimeError( + "Duplicate types <%s> cannot be dispatched." % str_signature(classes) + ) + self._dispatcher.add(tuple(classes), typ, on_ambiguity=on_ambiguity) + self._dispatcher.add(tuple(reversed(classes)), typ, on_ambiguity=on_ambiguity) + + @cacheit + def __call__(self, *args, _sympify=True, **kwargs): + """ + Parameters + ========== + + *args : + Arguments which are operated + """ + if _sympify: + args = tuple(map(_sympify_, args)) + handlers = frozenset(map(self._handlergetter, args)) + + # no need to sympify again + return self.dispatch(handlers)(*args, _sympify=False, **kwargs) + + @cacheit + def dispatch(self, handlers): + """ + Select the handler class, and return its handler method. + """ + + # Quick exit for the case where all handlers are same + if len(handlers) == 1: + h, = handlers + if not isinstance(h, type): + raise RuntimeError("Handler {!r} is not a type.".format(h)) + return h + + # Recursively select with registered binary priority + for i, typ in enumerate(handlers): + + if not isinstance(typ, type): + raise RuntimeError("Handler {!r} is not a type.".format(typ)) + + if i == 0: + handler = typ + else: + prev_handler = handler + handler = self._dispatcher.dispatch(prev_handler, typ) + + if not isinstance(handler, type): + raise RuntimeError( + "Dispatcher for {!r} and {!r} must return a type, but got {!r}".format( + prev_handler, typ, handler + )) + + # return handler class + return handler + + @property + def __doc__(self): + docs = [ + "Multiply dispatched associative operator: %s" % self.name, + "Note that support for this is experimental, see the docs for :class:`AssocOpDispatcher` for details" + ] + + if self.doc: + docs.append(self.doc) + + s = "Registered handler classes\n" + s += '=' * len(s) + docs.append(s) + + amb_sigs = [] + + typ_sigs = defaultdict(list) + for sigs in self._dispatcher.ordering[::-1]: + key = self._dispatcher.funcs[sigs] + typ_sigs[key].append(sigs) + + for typ, sigs in typ_sigs.items(): + + sigs_str = ', '.join('<%s>' % str_signature(sig) for sig in sigs) + + if isinstance(typ, RaiseNotImplementedError): + amb_sigs.append(sigs_str) + continue + + s = 'Inputs: %s\n' % sigs_str + s += '-' * len(s) + '\n' + s += typ.__name__ + docs.append(s) + + if amb_sigs: + s = "Ambiguous handler classes\n" + s += '=' * len(s) + docs.append(s) + + s = '\n'.join(amb_sigs) + docs.append(s) + + return '\n\n'.join(docs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/parameters.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/parameters.py new file mode 100644 index 0000000000000000000000000000000000000000..d911a3652bf02fa5b24c43b138035a57be687228 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/parameters.py @@ -0,0 +1,161 @@ +"""Thread-safe global parameters""" + +from .cache import clear_cache +from contextlib import contextmanager +from threading import local + +class _global_parameters(local): + """ + Thread-local global parameters. + + Explanation + =========== + + This class generates thread-local container for SymPy's global parameters. + Every global parameters must be passed as keyword argument when generating + its instance. + A variable, `global_parameters` is provided as default instance for this class. + + WARNING! Although the global parameters are thread-local, SymPy's cache is not + by now. + This may lead to undesired result in multi-threading operations. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.core.cache import clear_cache + >>> from sympy.core.parameters import global_parameters as gp + + >>> gp.evaluate + True + >>> x+x + 2*x + + >>> log = [] + >>> def f(): + ... clear_cache() + ... gp.evaluate = False + ... log.append(x+x) + ... clear_cache() + >>> import threading + >>> thread = threading.Thread(target=f) + >>> thread.start() + >>> thread.join() + + >>> print(log) + [x + x] + + >>> gp.evaluate + True + >>> x+x + 2*x + + References + ========== + + .. [1] https://docs.python.org/3/library/threading.html + + """ + def __init__(self, **kwargs): + self.__dict__.update(kwargs) + + def __setattr__(self, name, value): + if getattr(self, name) != value: + clear_cache() + return super().__setattr__(name, value) + +global_parameters = _global_parameters(evaluate=True, distribute=True, exp_is_pow=False) + +class evaluate: + """ Control automatic evaluation + + Explanation + =========== + + This context manager controls whether or not all SymPy functions evaluate + by default. + + Note that much of SymPy expects evaluated expressions. This functionality + is experimental and is unlikely to function as intended on large + expressions. + + Examples + ======== + + >>> from sympy import evaluate + >>> from sympy.abc import x + >>> print(x + x) + 2*x + >>> with evaluate(False): + ... print(x + x) + x + x + """ + def __init__(self, x): + self.x = x + self.old = [] + + def __enter__(self): + self.old.append(global_parameters.evaluate) + global_parameters.evaluate = self.x + + def __exit__(self, exc_type, exc_val, exc_tb): + global_parameters.evaluate = self.old.pop() + +@contextmanager +def distribute(x): + """ Control automatic distribution of Number over Add + + Explanation + =========== + + This context manager controls whether or not Mul distribute Number over + Add. Plan is to avoid distributing Number over Add in all of sympy. Once + that is done, this contextmanager will be removed. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.core.parameters import distribute + >>> print(2*(x + 1)) + 2*x + 2 + >>> with distribute(False): + ... print(2*(x + 1)) + 2*(x + 1) + """ + + old = global_parameters.distribute + + try: + global_parameters.distribute = x + yield + finally: + global_parameters.distribute = old + + +@contextmanager +def _exp_is_pow(x): + """ + Control whether `e^x` should be represented as ``exp(x)`` or a ``Pow(E, x)``. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x + >>> from sympy.core.parameters import _exp_is_pow + >>> with _exp_is_pow(True): print(type(exp(x))) + + >>> with _exp_is_pow(False): print(type(exp(x))) + exp + """ + old = global_parameters.exp_is_pow + + clear_cache() + try: + global_parameters.exp_is_pow = x + yield + finally: + clear_cache() + global_parameters.exp_is_pow = old diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/power.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/power.py new file mode 100644 index 0000000000000000000000000000000000000000..0f257d030553ecc7b887ca9d1199ccc19b9a642f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/power.py @@ -0,0 +1,1847 @@ +from __future__ import annotations +from typing import Callable, TYPE_CHECKING +from itertools import product + +from .sympify import _sympify +from .cache import cacheit +from .singleton import S +from .expr import Expr +from .evalf import PrecisionExhausted +from .function import (expand_complex, expand_multinomial, + expand_mul, _mexpand, PoleError) +from .logic import fuzzy_bool, fuzzy_not, fuzzy_and, fuzzy_or +from .parameters import global_parameters +from .relational import is_gt, is_lt +from .kind import NumberKind, UndefinedKind +from sympy.utilities.iterables import sift +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.misc import as_int +from sympy.multipledispatch import Dispatcher + + +class Pow(Expr): + """ + Defines the expression x**y as "x raised to a power y" + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Singleton definitions involving (0, 1, -1, oo, -oo, I, -I): + + +--------------+---------+-----------------------------------------------+ + | expr | value | reason | + +==============+=========+===============================================+ + | z**0 | 1 | Although arguments over 0**0 exist, see [2]. | + +--------------+---------+-----------------------------------------------+ + | z**1 | z | | + +--------------+---------+-----------------------------------------------+ + | (-oo)**(-1) | 0 | | + +--------------+---------+-----------------------------------------------+ + | (-1)**-1 | -1 | | + +--------------+---------+-----------------------------------------------+ + | S.Zero**-1 | zoo | This is not strictly true, as 0**-1 may be | + | | | undefined, but is convenient in some contexts | + | | | where the base is assumed to be positive. | + +--------------+---------+-----------------------------------------------+ + | 1**-1 | 1 | | + +--------------+---------+-----------------------------------------------+ + | oo**-1 | 0 | | + +--------------+---------+-----------------------------------------------+ + | 0**oo | 0 | Because for all complex numbers z near | + | | | 0, z**oo -> 0. | + +--------------+---------+-----------------------------------------------+ + | 0**-oo | zoo | This is not strictly true, as 0**oo may be | + | | | oscillating between positive and negative | + | | | values or rotating in the complex plane. | + | | | It is convenient, however, when the base | + | | | is positive. | + +--------------+---------+-----------------------------------------------+ + | 1**oo | nan | Because there are various cases where | + | 1**-oo | | lim(x(t),t)=1, lim(y(t),t)=oo (or -oo), | + | | | but lim( x(t)**y(t), t) != 1. See [3]. | + +--------------+---------+-----------------------------------------------+ + | b**zoo | nan | Because b**z has no limit as z -> zoo | + +--------------+---------+-----------------------------------------------+ + | (-1)**oo | nan | Because of oscillations in the limit. | + | (-1)**(-oo) | | | + +--------------+---------+-----------------------------------------------+ + | oo**oo | oo | | + +--------------+---------+-----------------------------------------------+ + | oo**-oo | 0 | | + +--------------+---------+-----------------------------------------------+ + | (-oo)**oo | nan | | + | (-oo)**-oo | | | + +--------------+---------+-----------------------------------------------+ + | oo**I | nan | oo**e could probably be best thought of as | + | (-oo)**I | | the limit of x**e for real x as x tends to | + | | | oo. If e is I, then the limit does not exist | + | | | and nan is used to indicate that. | + +--------------+---------+-----------------------------------------------+ + | oo**(1+I) | zoo | If the real part of e is positive, then the | + | (-oo)**(1+I) | | limit of abs(x**e) is oo. So the limit value | + | | | is zoo. | + +--------------+---------+-----------------------------------------------+ + | oo**(-1+I) | 0 | If the real part of e is negative, then the | + | -oo**(-1+I) | | limit is 0. | + +--------------+---------+-----------------------------------------------+ + + Because symbolic computations are more flexible than floating point + calculations and we prefer to never return an incorrect answer, + we choose not to conform to all IEEE 754 conventions. This helps + us avoid extra test-case code in the calculation of limits. + + See Also + ======== + + sympy.core.numbers.Infinity + sympy.core.numbers.NegativeInfinity + sympy.core.numbers.NaN + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Exponentiation + .. [2] https://en.wikipedia.org/wiki/Zero_to_the_power_of_zero + .. [3] https://en.wikipedia.org/wiki/Indeterminate_forms + + """ + is_Pow = True + + __slots__ = ('is_commutative',) + + if TYPE_CHECKING: + + @property + def args(self) -> tuple[Expr, Expr]: + ... + + @property + def base(self) -> Expr: + return self.args[0] + + @property + def exp(self) -> Expr: + return self.args[1] + + @property + def kind(self): + if self.exp.kind is NumberKind: + return self.base.kind + else: + return UndefinedKind + + @cacheit + def __new__(cls, b: Expr | complex, e: Expr | complex, evaluate=None) -> Expr: # type: ignore + if evaluate is None: + evaluate = global_parameters.evaluate + + base = _sympify(b) + exp = _sympify(e) + + # XXX: This can be removed when non-Expr args are disallowed rather + # than deprecated. + from .relational import Relational + if isinstance(base, Relational) or isinstance(exp, Relational): + raise TypeError('Relational cannot be used in Pow') + + # XXX: This should raise TypeError once deprecation period is over: + for arg in [base, exp]: + if not isinstance(arg, Expr): + sympy_deprecation_warning( + f""" + Using non-Expr arguments in Pow is deprecated (in this case, one of the + arguments is of type {type(arg).__name__!r}). + + If you really did intend to construct a power with this base, use the ** + operator instead.""", + deprecated_since_version="1.7", + active_deprecations_target="non-expr-args-deprecated", + stacklevel=4, + ) + + if evaluate: + if exp is S.ComplexInfinity: + return S.NaN + if exp is S.Infinity: + if is_gt(base, S.One): + return S.Infinity + if is_gt(base, S.NegativeOne) and is_lt(base, S.One): + return S.Zero + if is_lt(base, S.NegativeOne): + if base.is_finite: + return S.ComplexInfinity + if base.is_finite is False: + return S.NaN + if exp is S.Zero: + return S.One + elif exp is S.One: + return base + elif exp == -1 and not base: + return S.ComplexInfinity + elif exp.__class__.__name__ == "AccumulationBounds": + if base == S.Exp1: + from sympy.calculus.accumulationbounds import AccumBounds + return AccumBounds(Pow(base, exp.min), Pow(base, exp.max)) + # autosimplification if base is a number and exp odd/even + # if base is Number then the base will end up positive; we + # do not do this with arbitrary expressions since symbolic + # cancellation might occur as in (x - 1)/(1 - x) -> -1. If + # we returned Piecewise((-1, Ne(x, 1))) for such cases then + # we could do this...but we don't + elif (exp.is_Symbol and exp.is_integer or exp.is_Integer + ) and (base.is_number and base.is_Mul or base.is_Number + ) and base.could_extract_minus_sign(): + if exp.is_even: + base = -base + elif exp.is_odd: + return -Pow(-base, exp) + if S.NaN in (base, exp): # XXX S.NaN**x -> S.NaN under assumption that x != 0 + return S.NaN + elif base is S.One: + if abs(exp).is_infinite: + return S.NaN + return S.One + else: + # recognize base as E + from sympy.functions.elementary.exponential import exp_polar + if not exp.is_Atom and base is not S.Exp1 and not isinstance(base, exp_polar): + from .exprtools import factor_terms + from sympy.functions.elementary.exponential import log + from sympy.simplify.radsimp import fraction + c, ex = factor_terms(exp, sign=False).as_coeff_Mul() + num, den = fraction(ex) + if isinstance(den, log) and den.args[0] == base: + return S.Exp1**(c*num) + elif den.is_Add: + from sympy.functions.elementary.complexes import sign, im + s = sign(im(base)) + if s.is_Number and s and den == \ + log(-factor_terms(base, sign=False)) + s*S.ImaginaryUnit*S.Pi: + return S.Exp1**(c*num) + + obj = base._eval_power(exp) + if obj is not None: + return obj + obj = Expr.__new__(cls, base, exp) + obj = cls._exec_constructor_postprocessors(obj) + if not isinstance(obj, Pow): + return obj + obj.is_commutative = (base.is_commutative and exp.is_commutative) + return obj + + def inverse(self, argindex=1): + if self.base == S.Exp1: + from sympy.functions.elementary.exponential import log + return log + return None + + @classmethod + def class_key(cls): + return 3, 2, cls.__name__ + + def _eval_refine(self, assumptions): + from sympy.assumptions.ask import ask, Q + b, e = self.as_base_exp() + if ask(Q.integer(e), assumptions) and b.could_extract_minus_sign(): + if ask(Q.even(e), assumptions): + return Pow(-b, e) + elif ask(Q.odd(e), assumptions): + return -Pow(-b, e) + + def _eval_power(self, expt): + b, e = self.as_base_exp() + if b is S.NaN: + return (b**e)**expt # let __new__ handle it + + s = None + if expt.is_integer: + s = 1 + elif b.is_polar: # e.g. exp_polar, besselj, var('p', polar=True)... + s = 1 + elif e.is_extended_real is not None: + from sympy.functions.elementary.complexes import arg, im, re, sign + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.integers import floor + # helper functions =========================== + def _half(e): + """Return True if the exponent has a literal 2 as the + denominator, else None.""" + if getattr(e, 'q', None) == 2: + return True + n, d = e.as_numer_denom() + if n.is_integer and d == 2: + return True + def _n2(e): + """Return ``e`` evaluated to a Number with 2 significant + digits, else None.""" + try: + rv = e.evalf(2, strict=True) + if rv.is_Number: + return rv + except PrecisionExhausted: + pass + # =================================================== + if e.is_extended_real: + # we need _half(expt) with constant floor or + # floor(S.Half - e*arg(b)/2/pi) == 0 + + + # handle -1 as special case + if e == -1: + # floor arg. is 1/2 + arg(b)/2/pi + if _half(expt): + if b.is_negative is True: + return S.NegativeOne**expt*Pow(-b, e*expt) + elif b.is_negative is False: # XXX ok if im(b) != 0? + return Pow(b, -expt) + elif e.is_even: + if b.is_extended_real: + b = abs(b) + if b.is_imaginary: + b = abs(im(b))*S.ImaginaryUnit + + if (abs(e) < 1) == True or e == 1: + s = 1 # floor = 0 + elif b.is_extended_nonnegative: + s = 1 # floor = 0 + elif re(b).is_extended_nonnegative and (abs(e) < 2) == True: + s = 1 # floor = 0 + elif _half(expt): + s = exp(2*S.Pi*S.ImaginaryUnit*expt*floor( + S.Half - e*arg(b)/(2*S.Pi))) + if s.is_extended_real and _n2(sign(s) - s) == 0: + s = sign(s) + else: + s = None + else: + # e.is_extended_real is False requires: + # _half(expt) with constant floor or + # floor(S.Half - im(e*log(b))/2/pi) == 0 + try: + s = exp(2*S.ImaginaryUnit*S.Pi*expt* + floor(S.Half - im(e*log(b))/2/S.Pi)) + # be careful to test that s is -1 or 1 b/c sign(I) == I: + # so check that s is real + if s.is_extended_real and _n2(sign(s) - s) == 0: + s = sign(s) + else: + s = None + except PrecisionExhausted: + s = None + + if s is not None: + return s*Pow(b, e*expt) + + def _eval_Mod(self, q): + r"""A dispatched function to compute `b^e \bmod q`, dispatched + by ``Mod``. + + Notes + ===== + + Algorithms: + + 1. For unevaluated integer power, use built-in ``pow`` function + with 3 arguments, if powers are not too large wrt base. + + 2. For very large powers, use totient reduction if $e \ge \log(m)$. + Bound on m, is for safe factorization memory wise i.e. $m^{1/4}$. + For pollard-rho to be faster than built-in pow $\log(e) > m^{1/4}$ + check is added. + + 3. For any unevaluated power found in `b` or `e`, the step 2 + will be recursed down to the base and the exponent + such that the $b \bmod q$ becomes the new base and + $\phi(q) + e \bmod \phi(q)$ becomes the new exponent, and then + the computation for the reduced expression can be done. + """ + + base, exp = self.base, self.exp + + if exp.is_integer and exp.is_positive: + if q.is_integer and base % q == 0: + return S.Zero + + from sympy.functions.combinatorial.numbers import totient + + if base.is_Integer and exp.is_Integer and q.is_Integer: + b, e, m = int(base), int(exp), int(q) + mb = m.bit_length() + if mb <= 80 and e >= mb and e.bit_length()**4 >= m: + phi = int(totient(m)) + return Integer(pow(b, phi + e%phi, m)) + return Integer(pow(b, e, m)) + + from .mod import Mod + + if isinstance(base, Pow) and base.is_integer and base.is_number: + base = Mod(base, q) + return Mod(Pow(base, exp, evaluate=False), q) + + if isinstance(exp, Pow) and exp.is_integer and exp.is_number: + bit_length = int(q).bit_length() + # XXX Mod-Pow actually attempts to do a hanging evaluation + # if this dispatched function returns None. + # May need some fixes in the dispatcher itself. + if bit_length <= 80: + phi = totient(q) + exp = phi + Mod(exp, phi) + return Mod(Pow(base, exp, evaluate=False), q) + + def _eval_is_even(self): + if self.exp.is_integer and self.exp.is_positive: + return self.base.is_even + + def _eval_is_negative(self): + ext_neg = Pow._eval_is_extended_negative(self) + if ext_neg is True: + return self.is_finite + return ext_neg + + def _eval_is_extended_positive(self): + if self.base == self.exp: + if self.base.is_extended_nonnegative: + return True + elif self.base.is_positive: + if self.exp.is_real: + return True + elif self.base.is_extended_negative: + if self.exp.is_even: + return True + if self.exp.is_odd: + return False + elif self.base.is_zero: + if self.exp.is_extended_real: + return self.exp.is_zero + elif self.base.is_extended_nonpositive: + if self.exp.is_odd: + return False + elif self.base.is_imaginary: + if self.exp.is_integer: + m = self.exp % 4 + if m.is_zero: + return True + if m.is_integer and m.is_zero is False: + return False + if self.exp.is_imaginary: + from sympy.functions.elementary.exponential import log + return log(self.base).is_imaginary + + def _eval_is_extended_negative(self): + if self.exp is S.Half: + if self.base.is_complex or self.base.is_extended_real: + return False + if self.base.is_extended_negative: + if self.exp.is_odd and self.base.is_finite: + return True + if self.exp.is_even: + return False + elif self.base.is_extended_positive: + if self.exp.is_extended_real: + return False + elif self.base.is_zero: + if self.exp.is_extended_real: + return False + elif self.base.is_extended_nonnegative: + if self.exp.is_extended_nonnegative: + return False + elif self.base.is_extended_nonpositive: + if self.exp.is_even: + return False + elif self.base.is_extended_real: + if self.exp.is_even: + return False + + def _eval_is_zero(self): + if self.base.is_zero: + if self.exp.is_extended_positive: + return True + elif self.exp.is_extended_nonpositive: + return False + elif self.base == S.Exp1: + return self.exp is S.NegativeInfinity + elif self.base.is_zero is False: + if self.base.is_finite and self.exp.is_finite: + return False + elif self.exp.is_negative: + return self.base.is_infinite + elif self.exp.is_nonnegative: + return False + elif self.exp.is_infinite and self.exp.is_extended_real: + if (1 - abs(self.base)).is_extended_positive: + return self.exp.is_extended_positive + elif (1 - abs(self.base)).is_extended_negative: + return self.exp.is_extended_negative + elif self.base.is_finite and self.exp.is_negative: + # when self.base.is_zero is None + return False + + def _eval_is_integer(self): + b, e = self.args + if b.is_rational: + if b.is_integer is False and e.is_positive: + return False # rat**nonneg + if b.is_integer and e.is_integer: + if b is S.NegativeOne: + return True + if e.is_nonnegative or e.is_positive: + return True + if b.is_integer and e.is_negative and (e.is_finite or e.is_integer): + if fuzzy_not((b - 1).is_zero) and fuzzy_not((b + 1).is_zero): + return False + if b.is_Number and e.is_Number: + check = self.func(*self.args) + return check.is_Integer + if e.is_negative and b.is_positive and (b - 1).is_positive: + return False + if e.is_negative and b.is_negative and (b + 1).is_negative: + return False + + def _eval_is_extended_real(self): + if self.base is S.Exp1: + if self.exp.is_extended_real: + return True + elif self.exp.is_imaginary: + return (2*S.ImaginaryUnit*self.exp/S.Pi).is_even + + from sympy.functions.elementary.exponential import log, exp + real_b = self.base.is_extended_real + if real_b is None: + if self.base.func == exp and self.base.exp.is_imaginary: + return self.exp.is_imaginary + if self.base.func == Pow and self.base.base is S.Exp1 and self.base.exp.is_imaginary: + return self.exp.is_imaginary + return + real_e = self.exp.is_extended_real + if real_e is None: + return + if real_b and real_e: + if self.base.is_extended_positive: + return True + elif self.base.is_extended_nonnegative and self.exp.is_extended_nonnegative: + return True + elif self.exp.is_integer and self.base.is_extended_nonzero: + return True + elif self.exp.is_integer and self.exp.is_nonnegative: + return True + elif self.base.is_extended_negative: + if self.exp.is_Rational: + return False + if real_e and self.exp.is_extended_negative and self.base.is_zero is False: + return Pow(self.base, -self.exp).is_extended_real + im_b = self.base.is_imaginary + im_e = self.exp.is_imaginary + if im_b: + if self.exp.is_integer: + if self.exp.is_even: + return True + elif self.exp.is_odd: + return False + elif im_e and log(self.base).is_imaginary: + return True + elif self.exp.is_Add: + c, a = self.exp.as_coeff_Add() + if c and c.is_Integer: + return Mul( + self.base**c, self.base**a, evaluate=False).is_extended_real + elif self.base in (-S.ImaginaryUnit, S.ImaginaryUnit): + if (self.exp/2).is_integer is False: + return False + if real_b and im_e: + if self.base is S.NegativeOne: + return True + c = self.exp.coeff(S.ImaginaryUnit) + if c: + if self.base.is_rational and c.is_rational: + if self.base.is_nonzero and (self.base - 1).is_nonzero and c.is_nonzero: + return False + ok = (c*log(self.base)/S.Pi).is_integer + if ok is not None: + return ok + + if real_b is False and real_e: # we already know it's not imag + if isinstance(self.exp, Rational) and self.exp.p == 1: + return False + from sympy.functions.elementary.complexes import arg + i = arg(self.base)*self.exp/S.Pi + if i.is_complex: # finite + return i.is_integer + + def _eval_is_complex(self): + + if self.base == S.Exp1: + return fuzzy_or([self.exp.is_complex, self.exp.is_extended_negative]) + + if all(a.is_complex for a in self.args) and self._eval_is_finite(): + return True + + def _eval_is_imaginary(self): + if self.base.is_commutative is False: + return False + + if self.base.is_imaginary: + if self.exp.is_integer: + odd = self.exp.is_odd + if odd is not None: + return odd + return + + if self.base == S.Exp1: + f = 2 * self.exp / (S.Pi*S.ImaginaryUnit) + # exp(pi*integer) = 1 or -1, so not imaginary + if f.is_even: + return False + # exp(pi*integer + pi/2) = I or -I, so it is imaginary + if f.is_odd: + return True + return None + + if self.exp.is_imaginary: + from sympy.functions.elementary.exponential import log + imlog = log(self.base).is_imaginary + if imlog is not None: + return False # I**i -> real; (2*I)**i -> complex ==> not imaginary + + if self.base.is_extended_real and self.exp.is_extended_real: + if self.base.is_positive: + return False + else: + rat = self.exp.is_rational + if not rat: + return rat + if self.exp.is_integer: + return False + else: + half = (2*self.exp).is_integer + if half: + return self.base.is_negative + return half + + if self.base.is_extended_real is False: # we already know it's not imag + from sympy.functions.elementary.complexes import arg + i = arg(self.base)*self.exp/S.Pi + isodd = (2*i).is_odd + if isodd is not None: + return isodd + + def _eval_is_odd(self): + if self.exp.is_integer: + if self.exp.is_positive: + return self.base.is_odd + elif self.exp.is_nonnegative and self.base.is_odd: + return True + elif self.base is S.NegativeOne: + return True + + def _eval_is_finite(self): + if self.exp.is_negative: + if self.base.is_zero: + return False + if self.base.is_infinite or self.base.is_nonzero: + return True + c1 = self.base.is_finite + if c1 is None: + return + c2 = self.exp.is_finite + if c2 is None: + return + if c1 and c2: + if self.exp.is_nonnegative or fuzzy_not(self.base.is_zero): + return True + + def _eval_is_prime(self): + ''' + An integer raised to the n(>=2)-th power cannot be a prime. + ''' + if self.base.is_integer and self.exp.is_integer and (self.exp - 1).is_positive: + return False + + def _eval_is_composite(self): + """ + A power is composite if both base and exponent are greater than 1 + """ + if (self.base.is_integer and self.exp.is_integer and + ((self.base - 1).is_positive and (self.exp - 1).is_positive or + (self.base + 1).is_negative and self.exp.is_positive and self.exp.is_even)): + return True + + def _eval_is_polar(self): + return self.base.is_polar + + def _eval_subs(self, old, new): + from sympy.calculus.accumulationbounds import AccumBounds + + if isinstance(self.exp, AccumBounds): + b = self.base.subs(old, new) + e = self.exp.subs(old, new) + if isinstance(e, AccumBounds): + return e.__rpow__(b) + return self.func(b, e) + + from sympy.functions.elementary.exponential import exp, log + + def _check(ct1, ct2, old): + """Return (bool, pow, remainder_pow) where, if bool is True, then the + exponent of Pow `old` will combine with `pow` so the substitution + is valid, otherwise bool will be False. + + For noncommutative objects, `pow` will be an integer, and a factor + `Pow(old.base, remainder_pow)` needs to be included. If there is + no such factor, None is returned. For commutative objects, + remainder_pow is always None. + + cti are the coefficient and terms of an exponent of self or old + In this _eval_subs routine a change like (b**(2*x)).subs(b**x, y) + will give y**2 since (b**x)**2 == b**(2*x); if that equality does + not hold then the substitution should not occur so `bool` will be + False. + + """ + coeff1, terms1 = ct1 + coeff2, terms2 = ct2 + if terms1 == terms2: + if old.is_commutative: + # Allow fractional powers for commutative objects + pow = coeff1/coeff2 + try: + as_int(pow, strict=False) + combines = True + except ValueError: + b, e = old.as_base_exp() + # These conditions ensure that (b**e)**f == b**(e*f) for any f + combines = b.is_positive and e.is_real or b.is_nonnegative and e.is_nonnegative + + return combines, pow, None + else: + # With noncommutative symbols, substitute only integer powers + if not isinstance(terms1, tuple): + terms1 = (terms1,) + if not all(term.is_integer for term in terms1): + return False, None, None + + try: + # Round pow toward zero + pow, remainder = divmod(as_int(coeff1), as_int(coeff2)) + if pow < 0 and remainder != 0: + pow += 1 + remainder -= as_int(coeff2) + + if remainder == 0: + remainder_pow = None + else: + remainder_pow = Mul(remainder, *terms1) + + return True, pow, remainder_pow + except ValueError: + # Can't substitute + pass + + return False, None, None + + if old == self.base or (old == exp and self.base == S.Exp1): + if new.is_Function and isinstance(new, Callable): + return new(self.exp._subs(old, new)) + else: + return new**self.exp._subs(old, new) + + # issue 10829: (4**x - 3*y + 2).subs(2**x, y) -> y**2 - 3*y + 2 + if isinstance(old, self.func) and self.exp == old.exp: + l = log(self.base, old.base) + if l.is_Number: + return Pow(new, l) + + if isinstance(old, self.func) and self.base == old.base: + if self.exp.is_Add is False: + ct1 = self.exp.as_independent(Symbol, as_Add=False) + ct2 = old.exp.as_independent(Symbol, as_Add=False) + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + # issue 5180: (x**(6*y)).subs(x**(3*y),z)->z**2 + result = self.func(new, pow) + if remainder_pow is not None: + result = Mul(result, Pow(old.base, remainder_pow)) + return result + else: # b**(6*x + a).subs(b**(3*x), y) -> y**2 * b**a + # exp(exp(x) + exp(x**2)).subs(exp(exp(x)), w) -> w * exp(exp(x**2)) + oarg = old.exp + new_l = [] + o_al = [] + ct2 = oarg.as_coeff_mul() + for a in self.exp.args: + newa = a._subs(old, new) + ct1 = newa.as_coeff_mul() + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + new_l.append(new**pow) + if remainder_pow is not None: + o_al.append(remainder_pow) + continue + elif not old.is_commutative and not newa.is_integer: + # If any term in the exponent is non-integer, + # we do not do any substitutions in the noncommutative case + return + o_al.append(newa) + if new_l: + expo = Add(*o_al) + new_l.append(Pow(self.base, expo, evaluate=False) if expo != 1 else self.base) + return Mul(*new_l) + + if (isinstance(old, exp) or (old.is_Pow and old.base is S.Exp1)) and self.exp.is_extended_real and self.base.is_positive: + ct1 = old.exp.as_independent(Symbol, as_Add=False) + ct2 = (self.exp*log(self.base)).as_independent( + Symbol, as_Add=False) + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + result = self.func(new, pow) # (2**x).subs(exp(x*log(2)), z) -> z + if remainder_pow is not None: + result = Mul(result, Pow(old.base, remainder_pow)) + return result + + def as_base_exp(self): + """Return base and exp of self. + + Explanation + =========== + + If base a Rational less than 1, then return 1/Rational, -exp. + If this extra processing is not needed, the base and exp + properties will give the raw arguments. + + Examples + ======== + + >>> from sympy import Pow, S + >>> p = Pow(S.Half, 2, evaluate=False) + >>> p.as_base_exp() + (2, -2) + >>> p.args + (1/2, 2) + >>> p.base, p.exp + (1/2, 2) + + """ + b, e = self.args + if b.is_Rational and b.p == 1 and b.q != 1: + return Integer(b.q), -e + return b, e + + def _eval_adjoint(self): + from sympy.functions.elementary.complexes import adjoint + i, p = self.exp.is_integer, self.base.is_positive + if i: + return adjoint(self.base)**self.exp + if p: + return self.base**adjoint(self.exp) + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return adjoint(expanded) + + def _eval_conjugate(self): + from sympy.functions.elementary.complexes import conjugate as c + i, p = self.exp.is_integer, self.base.is_positive + if i: + return c(self.base)**self.exp + if p: + return self.base**c(self.exp) + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return c(expanded) + if self.is_extended_real: + return self + + def _eval_transpose(self): + from sympy.functions.elementary.complexes import transpose + if self.base == S.Exp1: + return self.func(S.Exp1, self.exp.transpose()) + i, p = self.exp.is_integer, (self.base.is_complex or self.base.is_infinite) + if p: + return self.base**self.exp + if i: + return transpose(self.base)**self.exp + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return transpose(expanded) + + def _eval_expand_power_exp(self, **hints): + """a**(n + m) -> a**n*a**m""" + b = self.base + e = self.exp + if b == S.Exp1: + from sympy.concrete.summations import Sum + if isinstance(e, Sum) and e.is_commutative: + from sympy.concrete.products import Product + return Product(self.func(b, e.function), *e.limits) + if e.is_Add and (hints.get('force', False) or + b.is_zero is False or e._all_nonneg_or_nonppos()): + if e.is_commutative: + return Mul(*[self.func(b, x) for x in e.args]) + if b.is_commutative: + c, nc = sift(e.args, lambda x: x.is_commutative, binary=True) + if c: + return Mul(*[self.func(b, x) for x in c] + )*b**Add._from_args(nc) + return self + + def _eval_expand_power_base(self, **hints): + """(a*b)**n -> a**n * b**n""" + force = hints.get('force', False) + + b = self.base + e = self.exp + if not b.is_Mul: + return self + + cargs, nc = b.args_cnc(split_1=False) + + # expand each term - this is top-level-only + # expansion but we have to watch out for things + # that don't have an _eval_expand method + if nc: + nc = [i._eval_expand_power_base(**hints) + if hasattr(i, '_eval_expand_power_base') else i + for i in nc] + + if e.is_Integer: + if e.is_positive: + rv = Mul(*nc*e) + else: + rv = Mul(*[i**-1 for i in nc[::-1]]*-e) + if cargs: + rv *= Mul(*cargs)**e + return rv + + if not cargs: + return self.func(Mul(*nc), e, evaluate=False) + + nc = [Mul(*nc)] + + # sift the commutative bases + other, maybe_real = sift(cargs, lambda x: x.is_extended_real is False, + binary=True) + def pred(x): + if x is S.ImaginaryUnit: + return S.ImaginaryUnit + polar = x.is_polar + if polar: + return True + if polar is None: + return fuzzy_bool(x.is_extended_nonnegative) + sifted = sift(maybe_real, pred) + nonneg = sifted[True] + other += sifted[None] + neg = sifted[False] + imag = sifted[S.ImaginaryUnit] + if imag: + I = S.ImaginaryUnit + i = len(imag) % 4 + if i == 0: + pass + elif i == 1: + other.append(I) + elif i == 2: + if neg: + nonn = -neg.pop() + if nonn is not S.One: + nonneg.append(nonn) + else: + neg.append(S.NegativeOne) + else: + if neg: + nonn = -neg.pop() + if nonn is not S.One: + nonneg.append(nonn) + else: + neg.append(S.NegativeOne) + other.append(I) + del imag + + # bring out the bases that can be separated from the base + + if force or e.is_integer: + # treat all commutatives the same and put nc in other + cargs = nonneg + neg + other + other = nc + else: + # this is just like what is happening automatically, except + # that now we are doing it for an arbitrary exponent for which + # no automatic expansion is done + + assert not e.is_Integer + + # handle negatives by making them all positive and putting + # the residual -1 in other + if len(neg) > 1: + o = S.One + if not other and neg[0].is_Number: + o *= neg.pop(0) + if len(neg) % 2: + o = -o + for n in neg: + nonneg.append(-n) + if o is not S.One: + other.append(o) + elif neg and other: + if neg[0].is_Number and neg[0] is not S.NegativeOne: + other.append(S.NegativeOne) + nonneg.append(-neg[0]) + else: + other.extend(neg) + else: + other.extend(neg) + del neg + + cargs = nonneg + other += nc + + rv = S.One + if cargs: + if e.is_Rational: + npow, cargs = sift(cargs, lambda x: x.is_Pow and + x.exp.is_Rational and x.base.is_number, + binary=True) + rv = Mul(*[self.func(b.func(*b.args), e) for b in npow]) + rv *= Mul(*[self.func(b, e, evaluate=False) for b in cargs]) + if other: + rv *= self.func(Mul(*other), e, evaluate=False) + return rv + + def _eval_expand_multinomial(self, **hints): + """(a + b + ..)**n -> a**n + n*a**(n-1)*b + .., n is nonzero integer""" + + base, exp = self.args + result = self + + if exp.is_Rational and exp.p > 0 and base.is_Add: + if not exp.is_Integer: + n = Integer(exp.p // exp.q) + + if not n: + return result + else: + radical, result = self.func(base, exp - n), [] + + expanded_base_n = self.func(base, n) + if expanded_base_n.is_Pow: + expanded_base_n = \ + expanded_base_n._eval_expand_multinomial() + for term in Add.make_args(expanded_base_n): + result.append(term*radical) + + return Add(*result) + + n = int(exp) + + if base.is_commutative: + order_terms, other_terms = [], [] + + for b in base.args: + if b.is_Order: + order_terms.append(b) + else: + other_terms.append(b) + + if order_terms: + # (f(x) + O(x^n))^m -> f(x)^m + m*f(x)^{m-1} *O(x^n) + f = Add(*other_terms) + o = Add(*order_terms) + + if n == 2: + return expand_multinomial(f**n, deep=False) + n*f*o + else: + g = expand_multinomial(f**(n - 1), deep=False) + return expand_mul(f*g, deep=False) + n*g*o + + if base.is_number: + # Efficiently expand expressions of the form (a + b*I)**n + # where 'a' and 'b' are real numbers and 'n' is integer. + a, b = base.as_real_imag() + + if a.is_Rational and b.is_Rational: + if not a.is_Integer: + if not b.is_Integer: + k = self.func(a.q * b.q, n) + a, b = a.p*b.q, a.q*b.p + else: + k = self.func(a.q, n) + a, b = a.p, a.q*b + elif not b.is_Integer: + k = self.func(b.q, n) + a, b = a*b.q, b.p + else: + k = 1 + + a, b, c, d = int(a), int(b), 1, 0 + + while n: + if n & 1: + c, d = a*c - b*d, b*c + a*d + n -= 1 + a, b = a*a - b*b, 2*a*b + n //= 2 + + I = S.ImaginaryUnit + + if k == 1: + return c + I*d + else: + return Integer(c)/k + I*d/k + + p = other_terms + # (x + y)**3 -> x**3 + 3*x**2*y + 3*x*y**2 + y**3 + # in this particular example: + # p = [x,y]; n = 3 + # so now it's easy to get the correct result -- we get the + # coefficients first: + from sympy.ntheory.multinomial import multinomial_coefficients + from sympy.polys.polyutils import basic_from_dict + expansion_dict = multinomial_coefficients(len(p), n) + # in our example: {(3, 0): 1, (1, 2): 3, (0, 3): 1, (2, 1): 3} + # and now construct the expression. + return basic_from_dict(expansion_dict, *p) + else: + if n == 2: + return Add(*[f*g for f in base.args for g in base.args]) + else: + multi = (base**(n - 1))._eval_expand_multinomial() + if multi.is_Add: + return Add(*[f*g for f in base.args + for g in multi.args]) + else: + # XXX can this ever happen if base was an Add? + return Add(*[f*multi for f in base.args]) + elif (exp.is_Rational and exp.p < 0 and base.is_Add and + abs(exp.p) > exp.q): + return 1 / self.func(base, -exp)._eval_expand_multinomial() + elif exp.is_Add and base.is_Number and (hints.get('force', False) or + base.is_zero is False or exp._all_nonneg_or_nonppos()): + # a + b a b + # n --> n n, where n, a, b are Numbers + # XXX should be in expand_power_exp? + coeff, tail = [], [] + for term in exp.args: + if term.is_Number: + coeff.append(self.func(base, term)) + else: + tail.append(term) + return Mul(*(coeff + [self.func(base, Add._from_args(tail))])) + else: + return result + + def as_real_imag(self, deep=True, **hints): + if self.exp.is_Integer: + from sympy.polys.polytools import poly + + exp = self.exp + re_e, im_e = self.base.as_real_imag(deep=deep) + if not im_e: + return self, S.Zero + a, b = symbols('a b', cls=Dummy) + if exp >= 0: + if re_e.is_Number and im_e.is_Number: + # We can be more efficient in this case + expr = expand_multinomial(self.base**exp) + if expr != self: + return expr.as_real_imag() + + expr = poly( + (a + b)**exp) # a = re, b = im; expr = (a + b*I)**exp + else: + mag = re_e**2 + im_e**2 + re_e, im_e = re_e/mag, -im_e/mag + if re_e.is_Number and im_e.is_Number: + # We can be more efficient in this case + expr = expand_multinomial((re_e + im_e*S.ImaginaryUnit)**-exp) + if expr != self: + return expr.as_real_imag() + + expr = poly((a + b)**-exp) + + # Terms with even b powers will be real + r = [i for i in expr.terms() if not i[0][1] % 2] + re_part = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + # Terms with odd b powers will be imaginary + r = [i for i in expr.terms() if i[0][1] % 4 == 1] + im_part1 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + r = [i for i in expr.terms() if i[0][1] % 4 == 3] + im_part3 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + + return (re_part.subs({a: re_e, b: S.ImaginaryUnit*im_e}), + im_part1.subs({a: re_e, b: im_e}) + im_part3.subs({a: re_e, b: -im_e})) + + from sympy.functions.elementary.trigonometric import atan2, cos, sin + + if self.exp.is_Rational: + re_e, im_e = self.base.as_real_imag(deep=deep) + + if im_e.is_zero and self.exp is S.Half: + if re_e.is_extended_nonnegative: + return self, S.Zero + if re_e.is_extended_nonpositive: + return S.Zero, (-self.base)**self.exp + + # XXX: This is not totally correct since for x**(p/q) with + # x being imaginary there are actually q roots, but + # only a single one is returned from here. + r = self.func(self.func(re_e, 2) + self.func(im_e, 2), S.Half) + + t = atan2(im_e, re_e) + + rp, tp = self.func(r, self.exp), t*self.exp + + return rp*cos(tp), rp*sin(tp) + elif self.base is S.Exp1: + from sympy.functions.elementary.exponential import exp + re_e, im_e = self.exp.as_real_imag() + if deep: + re_e = re_e.expand(deep, **hints) + im_e = im_e.expand(deep, **hints) + c, s = cos(im_e), sin(im_e) + return exp(re_e)*c, exp(re_e)*s + else: + from sympy.functions.elementary.complexes import im, re + if deep: + hints['complex'] = False + + expanded = self.expand(deep, **hints) + if hints.get('ignore') == expanded: + return None + else: + return (re(expanded), im(expanded)) + else: + return re(self), im(self) + + def _eval_derivative(self, s): + from sympy.functions.elementary.exponential import log + dbase = self.base.diff(s) + dexp = self.exp.diff(s) + return self * (dexp * log(self.base) + dbase * self.exp/self.base) + + def _eval_evalf(self, prec): + base, exp = self.as_base_exp() + if base == S.Exp1: + # Use mpmath function associated to class "exp": + from sympy.functions.elementary.exponential import exp as exp_function + return exp_function(self.exp, evaluate=False)._eval_evalf(prec) + base = base._evalf(prec) + if not exp.is_Integer: + exp = exp._evalf(prec) + if exp.is_negative and base.is_number and base.is_extended_real is False: + base = base.conjugate() / (base * base.conjugate())._evalf(prec) + exp = -exp + return self.func(base, exp).expand() + return self.func(base, exp) + + def _eval_is_polynomial(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return bool(self.base._eval_is_polynomial(syms) and + self.exp.is_Integer and (self.exp >= 0)) + else: + return True + + def _eval_is_rational(self): + # The evaluation of self.func below can be very expensive in the case + # of integer**integer if the exponent is large. We should try to exit + # before that if possible: + if (self.exp.is_integer and self.base.is_rational + and fuzzy_not(fuzzy_and([self.exp.is_negative, self.base.is_zero]))): + return True + p = self.func(*self.as_base_exp()) # in case it's unevaluated + if not p.is_Pow: + return p.is_rational + b, e = p.as_base_exp() + if e.is_Rational and b.is_Rational: + # we didn't check that e is not an Integer + # because Rational**Integer autosimplifies + return False + if e.is_integer: + if b.is_rational: + if fuzzy_not(b.is_zero) or e.is_nonnegative: + return True + if b == e: # always rational, even for 0**0 + return True + elif b.is_irrational: + return e.is_zero + if b is S.Exp1: + if e.is_rational and e.is_nonzero: + return False + + def _eval_is_algebraic(self): + def _is_one(expr): + try: + return (expr - 1).is_zero + except ValueError: + # when the operation is not allowed + return False + + if self.base.is_zero or _is_one(self.base): + return True + elif self.base is S.Exp1: + s = self.func(*self.args) + if s.func == self.func: + if self.exp.is_nonzero: + if self.exp.is_algebraic: + return False + elif (self.exp/S.Pi).is_rational: + return False + elif (self.exp/(S.ImaginaryUnit*S.Pi)).is_rational: + return True + else: + return s.is_algebraic + elif self.exp.is_rational: + if self.base.is_algebraic is False: + return self.exp.is_zero + if self.base.is_zero is False: + if self.exp.is_nonzero: + return self.base.is_algebraic + elif self.base.is_algebraic: + return True + if self.exp.is_positive: + return self.base.is_algebraic + elif self.base.is_algebraic and self.exp.is_algebraic: + if ((fuzzy_not(self.base.is_zero) + and fuzzy_not(_is_one(self.base))) + or self.base.is_integer is False + or self.base.is_irrational): + return self.exp.is_rational + + def _eval_is_rational_function(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return self.base._eval_is_rational_function(syms) and \ + self.exp.is_Integer + else: + return True + + def _eval_is_meromorphic(self, x, a): + # f**g is meromorphic if g is an integer and f is meromorphic. + # E**(log(f)*g) is meromorphic if log(f)*g is meromorphic + # and finite. + base_merom = self.base._eval_is_meromorphic(x, a) + exp_integer = self.exp.is_Integer + if exp_integer: + return base_merom + + exp_merom = self.exp._eval_is_meromorphic(x, a) + if base_merom is False: + # f**g = E**(log(f)*g) may be meromorphic if the + # singularities of log(f) and g cancel each other, + # for example, if g = 1/log(f). Hence, + return False if exp_merom else None + elif base_merom is None: + return None + + b = self.base.subs(x, a) + # b is extended complex as base is meromorphic. + # log(base) is finite and meromorphic when b != 0, zoo. + b_zero = b.is_zero + if b_zero: + log_defined = False + else: + log_defined = fuzzy_and((b.is_finite, fuzzy_not(b_zero))) + + if log_defined is False: # zero or pole of base + return exp_integer # False or None + elif log_defined is None: + return None + + if not exp_merom: + return exp_merom # False or None + + return self.exp.subs(x, a).is_finite + + def _eval_is_algebraic_expr(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return self.base._eval_is_algebraic_expr(syms) and \ + self.exp.is_Rational + else: + return True + + def _eval_rewrite_as_exp(self, base, expo, **kwargs): + from sympy.functions.elementary.exponential import exp, log + + if base.is_zero or base.has(exp) or expo.has(exp): + return base**expo + + evaluate = expo.has(Symbol) + + if base.has(Symbol): + # delay evaluation if expo is non symbolic + # (as exp(x*log(5)) automatically reduces to x**5) + if global_parameters.exp_is_pow: + return Pow(S.Exp1, log(base)*expo, evaluate=evaluate) + else: + return exp(log(base)*expo, evaluate=evaluate) + + else: + from sympy.functions.elementary.complexes import arg, Abs + return exp((log(Abs(base)) + S.ImaginaryUnit*arg(base))*expo) + + def as_numer_denom(self): + if not self.is_commutative: + return self, S.One + base, exp = self.as_base_exp() + n, d = base.as_numer_denom() + # this should be the same as ExpBase.as_numer_denom wrt + # exponent handling + neg_exp = exp.is_negative + if exp.is_Mul and not neg_exp and not exp.is_positive: + neg_exp = exp.could_extract_minus_sign() + int_exp = exp.is_integer + # the denominator cannot be separated from the numerator if + # its sign is unknown unless the exponent is an integer, e.g. + # sqrt(a/b) != sqrt(a)/sqrt(b) when a=1 and b=-1. But if the + # denominator is negative the numerator and denominator can + # be negated and the denominator (now positive) separated. + if not (d.is_extended_real or int_exp): + n = base + d = S.One + dnonpos = d.is_nonpositive + if dnonpos: + n, d = -n, -d + elif dnonpos is None and not int_exp: + n = base + d = S.One + if neg_exp: + n, d = d, n + exp = -exp + if exp.is_infinite: + if n is S.One and d is not S.One: + return n, self.func(d, exp) + if n is not S.One and d is S.One: + return self.func(n, exp), d + return self.func(n, exp), self.func(d, exp) + + def matches(self, expr, repl_dict=None, old=False): + expr = _sympify(expr) + if repl_dict is None: + repl_dict = {} + + # special case, pattern = 1 and expr.exp can match to 0 + if expr is S.One: + d = self.exp.matches(S.Zero, repl_dict) + if d is not None: + return d + + # make sure the expression to be matched is an Expr + if not isinstance(expr, Expr): + return None + + b, e = expr.as_base_exp() + + # special case number + sb, se = self.as_base_exp() + if sb.is_Symbol and se.is_Integer and expr: + if e.is_rational: + return sb.matches(b**(e/se), repl_dict) + return sb.matches(expr**(1/se), repl_dict) + + d = repl_dict.copy() + d = self.base.matches(b, d) + if d is None: + return None + + d = self.exp.xreplace(d).matches(e, d) + if d is None: + return Expr.matches(self, expr, repl_dict) + return d + + def _eval_nseries(self, x, n, logx, cdir=0): + # NOTE! This function is an important part of the gruntz algorithm + # for computing limits. It has to return a generalized power + # series with coefficients in C(log, log(x)). In more detail: + # It has to return an expression + # c_0*x**e_0 + c_1*x**e_1 + ... (finitely many terms) + # where e_i are numbers (not necessarily integers) and c_i are + # expressions involving only numbers, the log function, and log(x). + # The series expansion of b**e is computed as follows: + # 1) We express b as f*(1 + g) where f is the leading term of b. + # g has order O(x**d) where d is strictly positive. + # 2) Then b**e = (f**e)*((1 + g)**e). + # (1 + g)**e is computed using binomial series. + from sympy.functions.elementary.exponential import exp, log + from sympy.series.limits import limit + from sympy.series.order import Order + from sympy.core.sympify import sympify + if self.base is S.Exp1: + e_series = self.exp.nseries(x, n=n, logx=logx) + if e_series.is_Order: + return 1 + e_series + e0 = limit(e_series.removeO(), x, 0) + if e0 is S.NegativeInfinity: + return Order(x**n, x) + if e0 is S.Infinity: + return self + t = e_series - e0 + exp_series = term = exp(e0) + # series of exp(e0 + t) in t + for i in range(1, n): + term *= t/i + term = term.nseries(x, n=n, logx=logx) + exp_series += term + exp_series += Order(t**n, x) + from sympy.simplify.powsimp import powsimp + return powsimp(exp_series, deep=True, combine='exp') + from sympy.simplify.powsimp import powdenest + from .numbers import _illegal + self = powdenest(self, force=True).trigsimp() + b, e = self.as_base_exp() + + if e.has(*_illegal): + raise PoleError() + + if e.has(x): + return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + if logx is not None and b.has(log): + from .symbol import Wild + c, ex = symbols('c, ex', cls=Wild, exclude=[x]) + b = b.replace(log(c*x**ex), log(c) + ex*logx) + self = b**e + + b = b.removeO() + try: + from sympy.functions.special.gamma_functions import polygamma + if b.has(polygamma, S.EulerGamma) and logx is not None: + raise ValueError() + _, m = b.leadterm(x) + except (ValueError, NotImplementedError, PoleError): + b = b._eval_nseries(x, n=max(2, n), logx=logx, cdir=cdir).removeO() + if b.has(S.NaN, S.ComplexInfinity): + raise NotImplementedError() + _, m = b.leadterm(x) + + if e.has(log): + from sympy.simplify.simplify import logcombine + e = logcombine(e).cancel() + + if not (m.is_zero or e.is_number and e.is_real): + if self == self._eval_as_leading_term(x, logx=logx, cdir=cdir): + res = exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + if res == exp(e*log(b)): + return self + return res + + f = b.as_leading_term(x, logx=logx) + g = (_mexpand(b) - f).cancel() + g = g/f + if not m.is_number: + raise NotImplementedError() + maxpow = n - m*e + if maxpow.has(Symbol): + maxpow = sympify(n) + + if maxpow.is_negative: + return Order(x**(m*e), x) + + if g.is_zero: + r = f**e + if r != self: + r += Order(x**n, x) + return r + + def coeff_exp(term, x): + coeff, exp = S.One, S.Zero + for factor in Mul.make_args(term): + if factor.has(x): + base, exp = factor.as_base_exp() + if base != x: + try: + return term.leadterm(x) + except ValueError: + return term, S.Zero + else: + coeff *= factor + return coeff, exp + + def mul(d1, d2): + res = {} + for e1, e2 in product(d1, d2): + ex = e1 + e2 + if ex < maxpow: + res[ex] = res.get(ex, S.Zero) + d1[e1]*d2[e2] + return res + + try: + c, d = g.leadterm(x, logx=logx) + except (ValueError, NotImplementedError): + if limit(g/x**maxpow, x, 0) == 0: + # g has higher order zero + return f**e + e*f**e*g # first term of binomial series + else: + raise NotImplementedError() + if c.is_Float and d == S.Zero: + # Convert floats like 0.5 to exact SymPy numbers like S.Half, to + # prevent rounding errors which can induce wrong values of d leading + # to a NotImplementedError being returned from the block below. + g = g.replace(lambda x: x.is_Float, lambda x: Rational(x)) + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + g = g.simplify() + if g.is_zero: + return f**e + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + g = ((b - f)/f).expand() + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + raise NotImplementedError() + + from sympy.functions.elementary.integers import ceiling + gpoly = g._eval_nseries(x, n=ceiling(maxpow), logx=logx, cdir=cdir).removeO() + gterms = {} + + for term in Add.make_args(gpoly): + co1, e1 = coeff_exp(term, x) + gterms[e1] = gterms.get(e1, S.Zero) + co1 + + k = S.One + terms = {S.Zero: S.One} + tk = gterms + + from sympy.functions.combinatorial.factorials import factorial, ff + + while (k*d - maxpow).is_negative: + coeff = ff(e, k)/factorial(k) + for ex in tk: + terms[ex] = terms.get(ex, S.Zero) + coeff*tk[ex] + tk = mul(tk, gterms) + k += S.One + + from sympy.functions.elementary.complexes import im + + if not e.is_integer and m.is_zero and f.is_negative: + ndir = (b - f).dir(x, cdir) + if im(ndir).is_negative: + inco, inex = coeff_exp(f**e*(-1)**(-2*e), x) + elif im(ndir).is_zero: + inco, inex = coeff_exp(exp(e*log(b)).as_leading_term(x, logx=logx, cdir=cdir), x) + else: + inco, inex = coeff_exp(f**e, x) + else: + inco, inex = coeff_exp(f**e, x) + res = S.Zero + + for e1 in terms: + ex = e1 + inex + res += terms[e1]*inco*x**(ex) + + if not (e.is_integer and e.is_positive and (e*d - n).is_nonpositive and + res == _mexpand(self)): + try: + res += Order(x**n, x) + except NotImplementedError: + return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + return res + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.functions.elementary.exponential import exp, log + e = self.exp + b = self.base + if self.base is S.Exp1: + arg = e.as_leading_term(x, logx=logx) + arg0 = arg.subs(x, 0) + if arg0 is S.NaN: + arg0 = arg.limit(x, 0) + if arg0.is_infinite is False: + return S.Exp1**arg0 + raise PoleError("Cannot expand %s around 0" % (self)) + elif e.has(x): + lt = exp(e * log(b)) + return lt.as_leading_term(x, logx=logx, cdir=cdir) + else: + from sympy.functions.elementary.complexes import im + try: + f = b.as_leading_term(x, logx=logx, cdir=cdir) + except PoleError: + return self + if not e.is_integer and f.is_negative and not f.has(x): + ndir = (b - f).dir(x, cdir) + if im(ndir).is_negative: + # Normally, f**e would evaluate to exp(e*log(f)) but on branch cuts + # an other value is expected through the following computation + # exp(e*(log(f) - 2*pi*I)) == f**e*exp(-2*e*pi*I) == f**e*(-1)**(-2*e). + return self.func(f, e) * (-1)**(-2*e) + elif im(ndir).is_zero: + log_leadterm = log(b)._eval_as_leading_term(x, logx=logx, cdir=cdir) + if log_leadterm.is_infinite is False: + return exp(e*log_leadterm) + return self.func(f, e) + + @cacheit + def _taylor_term(self, n, x, *previous_terms): # of (1 + x)**e + from sympy.functions.combinatorial.factorials import binomial + return binomial(self.exp, n) * self.func(x, n) + + def taylor_term(self, n, x, *previous_terms): + if self.base is not S.Exp1: + return super().taylor_term(n, x, *previous_terms) + if n < 0: + return S.Zero + if n == 0: + return S.One + from .sympify import sympify + x = sympify(x) + if previous_terms: + p = previous_terms[-1] + if p is not None: + return p * x / n + from sympy.functions.combinatorial.factorials import factorial + return x**n/factorial(n) + + def _eval_rewrite_as_sin(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.trigonometric import sin + return sin(S.ImaginaryUnit*self.exp + S.Pi/2) - S.ImaginaryUnit*sin(S.ImaginaryUnit*self.exp) + + def _eval_rewrite_as_cos(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.trigonometric import cos + return cos(S.ImaginaryUnit*self.exp) + S.ImaginaryUnit*cos(S.ImaginaryUnit*self.exp + S.Pi/2) + + def _eval_rewrite_as_tanh(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.hyperbolic import tanh + return (1 + tanh(self.exp/2))/(1 - tanh(self.exp/2)) + + def _eval_rewrite_as_sqrt(self, base, exp, **kwargs): + from sympy.functions.elementary.trigonometric import sin, cos + if base is not S.Exp1: + return None + if exp.is_Mul: + coeff = exp.coeff(S.Pi * S.ImaginaryUnit) + if coeff and coeff.is_number: + cosine, sine = cos(S.Pi*coeff), sin(S.Pi*coeff) + if not isinstance(cosine, cos) and not isinstance (sine, sin): + return cosine + S.ImaginaryUnit*sine + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import sqrt + >>> sqrt(4 + 4*sqrt(2)).as_content_primitive() + (2, sqrt(1 + sqrt(2))) + >>> sqrt(3 + 3*sqrt(2)).as_content_primitive() + (1, sqrt(3)*sqrt(1 + sqrt(2))) + + >>> from sympy import expand_power_base, powsimp, Mul + >>> from sympy.abc import x, y + + >>> ((2*x + 2)**2).as_content_primitive() + (4, (x + 1)**2) + >>> (4**((1 + y)/2)).as_content_primitive() + (2, 4**(y/2)) + >>> (3**((1 + y)/2)).as_content_primitive() + (1, 3**((y + 1)/2)) + >>> (3**((5 + y)/2)).as_content_primitive() + (9, 3**((y + 1)/2)) + >>> eq = 3**(2 + 2*x) + >>> powsimp(eq) == eq + True + >>> eq.as_content_primitive() + (9, 3**(2*x)) + >>> powsimp(Mul(*_)) + 3**(2*x + 2) + + >>> eq = (2 + 2*x)**y + >>> s = expand_power_base(eq); s.is_Mul, s + (False, (2*x + 2)**y) + >>> eq.as_content_primitive() + (1, (2*(x + 1))**y) + >>> s = expand_power_base(_[1]); s.is_Mul, s + (True, 2**y*(x + 1)**y) + + See docstring of Expr.as_content_primitive for more examples. + """ + + b, e = self.as_base_exp() + b = _keep_coeff(*b.as_content_primitive(radical=radical, clear=clear)) + ce, pe = e.as_content_primitive(radical=radical, clear=clear) + if b.is_Rational: + #e + #= ce*pe + #= ce*(h + t) + #= ce*h + ce*t + #=> self + #= b**(ce*h)*b**(ce*t) + #= b**(cehp/cehq)*b**(ce*t) + #= b**(iceh + r/cehq)*b**(ce*t) + #= b**(iceh)*b**(r/cehq)*b**(ce*t) + #= b**(iceh)*b**(ce*t + r/cehq) + h, t = pe.as_coeff_Add() + if h.is_Rational and b != S.Zero: + ceh = ce*h + c = self.func(b, ceh) + r = S.Zero + if not c.is_Rational: + iceh, r = divmod(ceh.p, ceh.q) + c = self.func(b, iceh) + return c, self.func(b, _keep_coeff(ce, t + r/ce/ceh.q)) + e = _keep_coeff(ce, pe) + # b**e = (h*t)**e = h**e*t**e = c*m*t**e + if e.is_Rational and b.is_Mul: + h, t = b.as_content_primitive(radical=radical, clear=clear) # h is positive + c, m = self.func(h, e).as_coeff_Mul() # so c is positive + m, me = m.as_base_exp() + if m is S.One or me == e: # probably always true + # return the following, not return c, m*Pow(t, e) + # which would change Pow into Mul; we let SymPy + # decide what to do by using the unevaluated Mul, e.g + # should it stay as sqrt(2 + 2*sqrt(5)) or become + # sqrt(2)*sqrt(1 + sqrt(5)) + return c, self.func(_keep_coeff(m, t), e) + return S.One, self.func(b, e) + + def is_constant(self, *wrt, **flags): + expr = self + if flags.get('simplify', True): + expr = expr.simplify() + b, e = expr.as_base_exp() + bz = b.equals(0) + if bz: # recalculate with assumptions in case it's unevaluated + new = b**e + if new != expr: + return new.is_constant() + econ = e.is_constant(*wrt) + bcon = b.is_constant(*wrt) + if bcon: + if econ: + return True + bz = b.equals(0) + if bz is False: + return False + elif bcon is None: + return None + + return e.equals(0) + + def _eval_difference_delta(self, n, step): + b, e = self.args + if e.has(n) and not b.has(n): + new_e = e.subs(n, n + step) + return (b**(new_e - e) - 1) * self + +power = Dispatcher('power') +power.add((object, object), Pow) + +from .add import Add +from .numbers import Integer, Rational +from .mul import Mul, _keep_coeff +from .symbol import Symbol, Dummy, symbols diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/random.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/random.py new file mode 100644 index 0000000000000000000000000000000000000000..c02986283523b39462a1e2c0b97e3fb230cff100 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/random.py @@ -0,0 +1,227 @@ +""" +When you need to use random numbers in SymPy library code, import from here +so there is only one generator working for SymPy. Imports from here should +behave the same as if they were being imported from Python's random module. +But only the routines currently used in SymPy are included here. To use others +import ``rng`` and access the method directly. For example, to capture the +current state of the generator use ``rng.getstate()``. + +There is intentionally no Random to import from here. If you want +to control the state of the generator, import ``seed`` and call it +with or without an argument to set the state. + +Examples +======== + +>>> from sympy.core.random import random, seed +>>> assert random() < 1 +>>> seed(1); a = random() +>>> b = random() +>>> seed(1); c = random() +>>> assert a == c +>>> assert a != b # remote possibility this will fail + +""" +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import as_int + +import random as _random +rng = _random.Random() + +choice = rng.choice +random = rng.random +randint = rng.randint +randrange = rng.randrange +sample = rng.sample +# seed = rng.seed +shuffle = rng.shuffle +uniform = rng.uniform + +_assumptions_rng = _random.Random() +_assumptions_shuffle = _assumptions_rng.shuffle + + +def seed(a=None, version=2): + rng.seed(a=a, version=version) + _assumptions_rng.seed(a=a, version=version) + + +def random_complex_number(a=2, b=-1, c=3, d=1, rational=False, tolerance=None): + """ + Return a random complex number. + + To reduce chance of hitting branch cuts or anything, we guarantee + b <= Im z <= d, a <= Re z <= c + + When rational is True, a rational approximation to a random number + is obtained within specified tolerance, if any. + """ + from sympy.core.numbers import I + from sympy.simplify.simplify import nsimplify + A, B = uniform(a, c), uniform(b, d) + if not rational: + return A + I*B + return (nsimplify(A, rational=True, tolerance=tolerance) + + I*nsimplify(B, rational=True, tolerance=tolerance)) + + +def verify_numerically(f, g, z=None, tol=1.0e-6, a=2, b=-1, c=3, d=1): + """ + Test numerically that f and g agree when evaluated in the argument z. + + If z is None, all symbols will be tested. This routine does not test + whether there are Floats present with precision higher than 15 digits + so if there are, your results may not be what you expect due to round- + off errors. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x + >>> from sympy.core.random import verify_numerically as tn + >>> tn(sin(x)**2 + cos(x)**2, 1, x) + True + """ + from sympy.core.symbol import Symbol + from sympy.core.sympify import sympify + from sympy.core.numbers import comp + f, g = (sympify(i) for i in (f, g)) + if z is None: + z = f.free_symbols | g.free_symbols + elif isinstance(z, Symbol): + z = [z] + reps = list(zip(z, [random_complex_number(a, b, c, d) for _ in z])) + z1 = f.subs(reps).n() + z2 = g.subs(reps).n() + return comp(z1, z2, tol) + + +def test_derivative_numerically(f, z, tol=1.0e-6, a=2, b=-1, c=3, d=1): + """ + Test numerically that the symbolically computed derivative of f + with respect to z is correct. + + This routine does not test whether there are Floats present with + precision higher than 15 digits so if there are, your results may + not be what you expect due to round-off errors. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x + >>> from sympy.core.random import test_derivative_numerically as td + >>> td(sin(x), x) + True + """ + from sympy.core.numbers import comp + from sympy.core.function import Derivative + z0 = random_complex_number(a, b, c, d) + f1 = f.diff(z).subs(z, z0) + f2 = Derivative(f, z).doit_numerically(z0) + return comp(f1.n(), f2.n(), tol) + + +def _randrange(seed=None): + """Return a randrange generator. + + ``seed`` can be + + * None - return randomly seeded generator + * int - return a generator seeded with the int + * list - the values to be returned will be taken from the list + in the order given; the provided list is not modified. + + Examples + ======== + + >>> from sympy.core.random import _randrange + >>> rr = _randrange() + >>> rr(1000) # doctest: +SKIP + 999 + >>> rr = _randrange(3) + >>> rr(1000) # doctest: +SKIP + 238 + >>> rr = _randrange([0, 5, 1, 3, 4]) + >>> rr(3), rr(3) + (0, 1) + """ + if seed is None: + return randrange + elif isinstance(seed, int): + rng.seed(seed) + return randrange + elif is_sequence(seed): + seed = list(seed) # make a copy + seed.reverse() + + def give(a, b=None, seq=seed): + if b is None: + a, b = 0, a + a, b = as_int(a), as_int(b) + w = b - a + if w < 1: + raise ValueError('_randrange got empty range') + try: + x = seq.pop() + except IndexError: + raise ValueError('_randrange sequence was too short') + if a <= x < b: + return x + else: + return give(a, b, seq) + return give + else: + raise ValueError('_randrange got an unexpected seed') + + +def _randint(seed=None): + """Return a randint generator. + + ``seed`` can be + + * None - return randomly seeded generator + * int - return a generator seeded with the int + * list - the values to be returned will be taken from the list + in the order given; the provided list is not modified. + + Examples + ======== + + >>> from sympy.core.random import _randint + >>> ri = _randint() + >>> ri(1, 1000) # doctest: +SKIP + 999 + >>> ri = _randint(3) + >>> ri(1, 1000) # doctest: +SKIP + 238 + >>> ri = _randint([0, 5, 1, 2, 4]) + >>> ri(1, 3), ri(1, 3) + (1, 2) + """ + if seed is None: + return randint + elif isinstance(seed, int): + rng.seed(seed) + return randint + elif is_sequence(seed): + seed = list(seed) # make a copy + seed.reverse() + + def give(a, b, seq=seed): + a, b = as_int(a), as_int(b) + w = b - a + if w < 0: + raise ValueError('_randint got empty range') + try: + x = seq.pop() + except IndexError: + raise ValueError('_randint sequence was too short') + if a <= x <= b: + return x + else: + return give(a, b, seq) + return give + else: + raise ValueError('_randint got an unexpected seed') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/relational.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/relational.py new file mode 100644 index 0000000000000000000000000000000000000000..28bf039c9be67a6f5cd6f11df1968961c0760373 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/relational.py @@ -0,0 +1,1622 @@ +from __future__ import annotations + +from .basic import Atom, Basic +from .coreerrors import LazyExceptionMessage +from .sorting import ordered +from .evalf import EvalfMixin +from .function import AppliedUndef +from .numbers import int_valued +from .singleton import S +from .sympify import _sympify, SympifyError +from .parameters import global_parameters +from .logic import fuzzy_bool, fuzzy_xor, fuzzy_and, fuzzy_not +from sympy.logic.boolalg import Boolean, BooleanAtom +from sympy.utilities.iterables import sift +from sympy.utilities.misc import filldedent +from sympy.utilities.exceptions import sympy_deprecation_warning + + +__all__ = ( + 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', + 'Relational', 'Equality', 'Unequality', 'StrictLessThan', 'LessThan', + 'StrictGreaterThan', 'GreaterThan', +) + +from .expr import Expr +from sympy.multipledispatch import dispatch +from .containers import Tuple +from .symbol import Symbol + + +def _nontrivBool(side): + return isinstance(side, Boolean) and \ + not isinstance(side, Atom) + + +# Note, see issue 4986. Ideally, we wouldn't want to subclass both Boolean +# and Expr. +# from .. import Expr + + +def _canonical(cond): + # return a condition in which all relationals are canonical + reps = {r: r.canonical for r in cond.atoms(Relational)} + return cond.xreplace(reps) + # XXX: AttributeError was being caught here but it wasn't triggered by any of + # the tests so I've removed it... + + +def _canonical_coeff(rel): + # return -2*x + 1 < 0 as x > 1/2 + # XXX make this part of Relational.canonical? + rel = rel.canonical + if not rel.is_Relational or rel.rhs.is_Boolean: + return rel # Eq(x, True) + if not isinstance(rel.lhs, Expr): + return rel.reversed # e.g.: Eq(True, x) -> Eq(x, True) + b, l = rel.lhs.as_coeff_Add(rational=True) + m, lhs = l.as_coeff_Mul(rational=True) + rhs = (rel.rhs - b)/m + if m < 0: + return rel.reversed.func(lhs, rhs) + return rel.func(lhs, rhs) + + +class Relational(Boolean, EvalfMixin): + """Base class for all relation types. + + Explanation + =========== + + Subclasses of Relational should generally be instantiated directly, but + Relational can be instantiated with a valid ``rop`` value to dispatch to + the appropriate subclass. + + Parameters + ========== + + rop : str or None + Indicates what subclass to instantiate. Valid values can be found + in the keys of Relational.ValidRelationOperator. + + Examples + ======== + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> Rel(y, x + x**2, '==') + Eq(y, x**2 + x) + + A relation's type can be defined upon creation using ``rop``. + The relation type of an existing expression can be obtained + using its ``rel_op`` property. + Here is a table of all the relation types, along with their + ``rop`` and ``rel_op`` values: + + +---------------------+----------------------------+------------+ + |Relation |``rop`` |``rel_op`` | + +=====================+============================+============+ + |``Equality`` |``==`` or ``eq`` or ``None``|``==`` | + +---------------------+----------------------------+------------+ + |``Unequality`` |``!=`` or ``ne`` |``!=`` | + +---------------------+----------------------------+------------+ + |``GreaterThan`` |``>=`` or ``ge`` |``>=`` | + +---------------------+----------------------------+------------+ + |``LessThan`` |``<=`` or ``le`` |``<=`` | + +---------------------+----------------------------+------------+ + |``StrictGreaterThan``|``>`` or ``gt`` |``>`` | + +---------------------+----------------------------+------------+ + |``StrictLessThan`` |``<`` or ``lt`` |``<`` | + +---------------------+----------------------------+------------+ + + For example, setting ``rop`` to ``==`` produces an + ``Equality`` relation, ``Eq()``. + So does setting ``rop`` to ``eq``, or leaving ``rop`` unspecified. + That is, the first three ``Rel()`` below all produce the same result. + Using a ``rop`` from a different row in the table produces a + different relation type. + For example, the fourth ``Rel()`` below using ``lt`` for ``rop`` + produces a ``StrictLessThan`` inequality: + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> Rel(y, x + x**2, '==') + Eq(y, x**2 + x) + >>> Rel(y, x + x**2, 'eq') + Eq(y, x**2 + x) + >>> Rel(y, x + x**2) + Eq(y, x**2 + x) + >>> Rel(y, x + x**2, 'lt') + y < x**2 + x + + To obtain the relation type of an existing expression, + get its ``rel_op`` property. + For example, ``rel_op`` is ``==`` for the ``Equality`` relation above, + and ``<`` for the strict less than inequality above: + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> my_equality = Rel(y, x + x**2, '==') + >>> my_equality.rel_op + '==' + >>> my_inequality = Rel(y, x + x**2, 'lt') + >>> my_inequality.rel_op + '<' + + """ + __slots__ = () + + ValidRelationOperator: dict[str | None, type[Relational]] = {} + + is_Relational = True + + # ValidRelationOperator - Defined below, because the necessary classes + # have not yet been defined + + def __new__(cls, lhs, rhs, rop=None, **assumptions): + # If called by a subclass, do nothing special and pass on to Basic. + if cls is not Relational: + return Basic.__new__(cls, lhs, rhs, **assumptions) + + # XXX: Why do this? There should be a separate function to make a + # particular subclass of Relational from a string. + # + # If called directly with an operator, look up the subclass + # corresponding to that operator and delegate to it + cls = cls.ValidRelationOperator.get(rop, None) + if cls is None: + raise ValueError("Invalid relational operator symbol: %r" % rop) + + if not issubclass(cls, (Eq, Ne)): + # validate that Booleans are not being used in a relational + # other than Eq/Ne; + # Note: Symbol is a subclass of Boolean but is considered + # acceptable here. + if any(map(_nontrivBool, (lhs, rhs))): + raise TypeError(filldedent(''' + A Boolean argument can only be used in + Eq and Ne; all other relationals expect + real expressions. + ''')) + + return cls(lhs, rhs, **assumptions) + + @property + def lhs(self): + """The left-hand side of the relation.""" + return self._args[0] + + @property + def rhs(self): + """The right-hand side of the relation.""" + return self._args[1] + + @property + def reversed(self): + """Return the relationship with sides reversed. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.reversed + Eq(1, x) + >>> x < 1 + x < 1 + >>> _.reversed + 1 > x + """ + ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} + a, b = self.args + return Relational.__new__(ops.get(self.func, self.func), b, a) + + @property + def reversedsign(self): + """Return the relationship with signs reversed. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.reversedsign + Eq(-x, -1) + >>> x < 1 + x < 1 + >>> _.reversedsign + -x > -1 + """ + a, b = self.args + if not (isinstance(a, BooleanAtom) or isinstance(b, BooleanAtom)): + ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} + return Relational.__new__(ops.get(self.func, self.func), -a, -b) + else: + return self + + @property + def negated(self): + """Return the negated relationship. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.negated + Ne(x, 1) + >>> x < 1 + x < 1 + >>> _.negated + x >= 1 + + Notes + ===== + + This works more or less identical to ``~``/``Not``. The difference is + that ``negated`` returns the relationship even if ``evaluate=False``. + Hence, this is useful in code when checking for e.g. negated relations + to existing ones as it will not be affected by the `evaluate` flag. + + """ + ops = {Eq: Ne, Ge: Lt, Gt: Le, Le: Gt, Lt: Ge, Ne: Eq} + # If there ever will be new Relational subclasses, the following line + # will work until it is properly sorted out + # return ops.get(self.func, lambda a, b, evaluate=False: ~(self.func(a, + # b, evaluate=evaluate)))(*self.args, evaluate=False) + return Relational.__new__(ops.get(self.func), *self.args) + + @property + def weak(self): + """return the non-strict version of the inequality or self + + EXAMPLES + ======== + + >>> from sympy.abc import x + >>> (x < 1).weak + x <= 1 + >>> _.weak + x <= 1 + """ + return self + + @property + def strict(self): + """return the strict version of the inequality or self + + EXAMPLES + ======== + + >>> from sympy.abc import x + >>> (x <= 1).strict + x < 1 + >>> _.strict + x < 1 + """ + return self + + def _eval_evalf(self, prec): + return self.func(*[s._evalf(prec) for s in self.args]) + + @property + def canonical(self): + """Return a canonical form of the relational by putting a + number on the rhs, canonically removing a sign or else + ordering the args canonically. No other simplification is + attempted. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x < 2 + x < 2 + >>> _.reversed.canonical + x < 2 + >>> (-y < x).canonical + x > -y + >>> (-y > x).canonical + x < -y + >>> (-y < -x).canonical + x < y + + The canonicalization is recursively applied: + + >>> from sympy import Eq + >>> Eq(x < y, y > x).canonical + True + """ + args = tuple([i.canonical if isinstance(i, Relational) else i for i in self.args]) + if args != self.args: + r = self.func(*args) + if not isinstance(r, Relational): + return r + else: + r = self + if r.rhs.is_number: + if r.rhs.is_Number and r.lhs.is_Number and r.lhs > r.rhs: + r = r.reversed + elif r.lhs.is_number: + r = r.reversed + elif tuple(ordered(args)) != args: + r = r.reversed + + LHS_CEMS = getattr(r.lhs, 'could_extract_minus_sign', None) + RHS_CEMS = getattr(r.rhs, 'could_extract_minus_sign', None) + + if isinstance(r.lhs, BooleanAtom) or isinstance(r.rhs, BooleanAtom): + return r + + # Check if first value has negative sign + if LHS_CEMS and LHS_CEMS(): + return r.reversedsign + elif not r.rhs.is_number and RHS_CEMS and RHS_CEMS(): + # Right hand side has a minus, but not lhs. + # How does the expression with reversed signs behave? + # This is so that expressions of the type + # Eq(x, -y) and Eq(-x, y) + # have the same canonical representation + expr1, _ = ordered([r.lhs, -r.rhs]) + if expr1 != r.lhs: + return r.reversed.reversedsign + + return r + + def equals(self, other, failing_expression=False): + """Return True if the sides of the relationship are mathematically + identical and the type of relationship is the same. + If failing_expression is True, return the expression whose truth value + was unknown.""" + if isinstance(other, Relational): + if other in (self, self.reversed): + return True + a, b = self, other + if a.func in (Eq, Ne) or b.func in (Eq, Ne): + if a.func != b.func: + return False + left, right = [i.equals(j, + failing_expression=failing_expression) + for i, j in zip(a.args, b.args)] + if left is True: + return right + if right is True: + return left + lr, rl = [i.equals(j, failing_expression=failing_expression) + for i, j in zip(a.args, b.reversed.args)] + if lr is True: + return rl + if rl is True: + return lr + e = (left, right, lr, rl) + if all(i is False for i in e): + return False + for i in e: + if i not in (True, False): + return i + else: + if b.func != a.func: + b = b.reversed + if a.func != b.func: + return False + left = a.lhs.equals(b.lhs, + failing_expression=failing_expression) + if left is False: + return False + right = a.rhs.equals(b.rhs, + failing_expression=failing_expression) + if right is False: + return False + if left is True: + return right + return left + + def _eval_simplify(self, **kwargs): + from .add import Add + from .expr import Expr + r = self + r = r.func(*[i.simplify(**kwargs) for i in r.args]) + if r.is_Relational: + if not isinstance(r.lhs, Expr) or not isinstance(r.rhs, Expr): + return r + dif = r.lhs - r.rhs + # replace dif with a valid Number that will + # allow a definitive comparison with 0 + v = None + if dif.is_comparable: + v = dif.n(2) + if any(i._prec == 1 for i in v.as_real_imag()): + rv, iv = [i.n(2) for i in dif.as_real_imag()] + v = rv + S.ImaginaryUnit*iv + elif dif.equals(0): # XXX this is expensive + v = S.Zero + if v is not None: + r = r.func._eval_relation(v, S.Zero) + r = r.canonical + # If there is only one symbol in the expression, + # try to write it on a simplified form + free = list(filter(lambda x: x.is_real is not False, r.free_symbols)) + if len(free) == 1: + try: + from sympy.solvers.solveset import linear_coeffs + x = free.pop() + dif = r.lhs - r.rhs + m, b = linear_coeffs(dif, x) + if m.is_zero is False: + if m.is_negative: + # Dividing with a negative number, so change order of arguments + # canonical will put the symbol back on the lhs later + r = r.func(-b / m, x) + else: + r = r.func(x, -b / m) + else: + r = r.func(b, S.Zero) + except ValueError: + # maybe not a linear function, try polynomial + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import gcd, Poly, poly + try: + p = poly(dif, x) + c = p.all_coeffs() + constant = c[-1] + c[-1] = 0 + scale = gcd(c) + c = [ctmp / scale for ctmp in c] + r = r.func(Poly.from_list(c, x).as_expr(), -constant / scale) + except PolynomialError: + pass + elif len(free) >= 2: + try: + from sympy.solvers.solveset import linear_coeffs + from sympy.polys.polytools import gcd + free = list(ordered(free)) + dif = r.lhs - r.rhs + m = linear_coeffs(dif, *free) + constant = m[-1] + del m[-1] + scale = gcd(m) + m = [mtmp / scale for mtmp in m] + nzm = list(filter(lambda f: f[0] != 0, list(zip(m, free)))) + if scale.is_zero is False: + if constant != 0: + # lhs: expression, rhs: constant + newexpr = Add(*[i * j for i, j in nzm]) + r = r.func(newexpr, -constant / scale) + else: + # keep first term on lhs + lhsterm = nzm[0][0] * nzm[0][1] + del nzm[0] + newexpr = Add(*[i * j for i, j in nzm]) + r = r.func(lhsterm, -newexpr) + + else: + r = r.func(constant, S.Zero) + except ValueError: + pass + # Did we get a simplified result? + r = r.canonical + measure = kwargs['measure'] + if measure(r) < kwargs['ratio'] * measure(self): + return r + else: + return self + + def _eval_trigsimp(self, **opts): + from sympy.simplify.trigsimp import trigsimp + return self.func(trigsimp(self.lhs, **opts), trigsimp(self.rhs, **opts)) + + def expand(self, **kwargs): + args = (arg.expand(**kwargs) for arg in self.args) + return self.func(*args) + + def __bool__(self) -> bool: + raise TypeError( + LazyExceptionMessage( + lambda: f"cannot determine truth value of Relational: {self}" + ) + ) + + def _eval_as_set(self): + # self is univariate and periodicity(self, x) in (0, None) + from sympy.solvers.inequalities import solve_univariate_inequality + from sympy.sets.conditionset import ConditionSet + syms = self.free_symbols + assert len(syms) == 1 + x = syms.pop() + try: + xset = solve_univariate_inequality(self, x, relational=False) + except NotImplementedError: + # solve_univariate_inequality raises NotImplementedError for + # unsolvable equations/inequalities. + xset = ConditionSet(x, self, S.Reals) + return xset + + @property + def binary_symbols(self): + # override where necessary + return set() + + +Rel = Relational + + +class Equality(Relational): + """ + An equal relation between two objects. + + Explanation + =========== + + Represents that two objects are equal. If they can be easily shown + to be definitively equal (or unequal), this will reduce to True (or + False). Otherwise, the relation is maintained as an unevaluated + Equality object. Use the ``simplify`` function on this object for + more nontrivial evaluation of the equality relation. + + As usual, the keyword argument ``evaluate=False`` can be used to + prevent any evaluation. + + Examples + ======== + + >>> from sympy import Eq, simplify, exp, cos + >>> from sympy.abc import x, y + >>> Eq(y, x + x**2) + Eq(y, x**2 + x) + >>> Eq(2, 5) + False + >>> Eq(2, 5, evaluate=False) + Eq(2, 5) + >>> _.doit() + False + >>> Eq(exp(x), exp(x).rewrite(cos)) + Eq(exp(x), sinh(x) + cosh(x)) + >>> simplify(_) + True + + See Also + ======== + + sympy.logic.boolalg.Equivalent : for representing equality between two + boolean expressions + + Notes + ===== + + Python treats 1 and True (and 0 and False) as being equal; SymPy + does not. And integer will always compare as unequal to a Boolean: + + >>> Eq(True, 1), True == 1 + (False, True) + + This class is not the same as the == operator. The == operator tests + for exact structural equality between two expressions; this class + compares expressions mathematically. + + If either object defines an ``_eval_Eq`` method, it can be used in place of + the default algorithm. If ``lhs._eval_Eq(rhs)`` or ``rhs._eval_Eq(lhs)`` + returns anything other than None, that return value will be substituted for + the Equality. If None is returned by ``_eval_Eq``, an Equality object will + be created as usual. + + Since this object is already an expression, it does not respond to + the method ``as_expr`` if one tries to create `x - y` from ``Eq(x, y)``. + If ``eq = Eq(x, y)`` then write `eq.lhs - eq.rhs` to get ``x - y``. + + .. deprecated:: 1.5 + + ``Eq(expr)`` with a single argument is a shorthand for ``Eq(expr, 0)``, + but this behavior is deprecated and will be removed in a future version + of SymPy. + + """ + rel_op = '==' + + __slots__ = () + + is_Equality = True + + def __new__(cls, lhs, rhs, **options): + evaluate = options.pop('evaluate', global_parameters.evaluate) + lhs = _sympify(lhs) + rhs = _sympify(rhs) + if evaluate: + val = is_eq(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + return Relational.__new__(cls, lhs, rhs) + + @classmethod + def _eval_relation(cls, lhs, rhs): + return _sympify(lhs == rhs) + + def _eval_rewrite_as_Add(self, L, R, evaluate=True, **kwargs): + """ + return Eq(L, R) as L - R. To control the evaluation of + the result set pass `evaluate=True` to give L - R; + if `evaluate=None` then terms in L and R will not cancel + but they will be listed in canonical order; otherwise + non-canonical args will be returned. If one side is 0, the + non-zero side will be returned. + + .. deprecated:: 1.13 + + The method ``Eq.rewrite(Add)`` is deprecated. + See :ref:`eq-rewrite-Add` for details. + + Examples + ======== + + >>> from sympy import Eq, Add + >>> from sympy.abc import b, x + >>> eq = Eq(x + b, x - b) + >>> eq.rewrite(Add) #doctest: +SKIP + 2*b + >>> eq.rewrite(Add, evaluate=None).args #doctest: +SKIP + (b, b, x, -x) + >>> eq.rewrite(Add, evaluate=False).args #doctest: +SKIP + (b, x, b, -x) + """ + sympy_deprecation_warning(""" + Eq.rewrite(Add) is deprecated. + + For ``eq = Eq(a, b)`` use ``eq.lhs - eq.rhs`` to obtain + ``a - b``. + """, + deprecated_since_version="1.13", + active_deprecations_target="eq-rewrite-Add", + stacklevel=5, + ) + from .add import _unevaluated_Add, Add + if L == 0: + return R + if R == 0: + return L + if evaluate: + # allow cancellation of args + return L - R + args = Add.make_args(L) + Add.make_args(-R) + if evaluate is None: + # no cancellation, but canonical + return _unevaluated_Add(*args) + # no cancellation, not canonical + return Add._from_args(args) + + @property + def binary_symbols(self): + if S.true in self.args or S.false in self.args: + if self.lhs.is_Symbol: + return {self.lhs} + elif self.rhs.is_Symbol: + return {self.rhs} + return set() + + def _eval_simplify(self, **kwargs): + # standard simplify + e = super()._eval_simplify(**kwargs) + if not isinstance(e, Equality): + return e + from .expr import Expr + if not isinstance(e.lhs, Expr) or not isinstance(e.rhs, Expr): + return e + free = self.free_symbols + if len(free) == 1: + try: + from .add import Add + from sympy.solvers.solveset import linear_coeffs + x = free.pop() + m, b = linear_coeffs( + Add(e.lhs, -e.rhs, evaluate=False), x) + if m.is_zero is False: + enew = e.func(x, -b / m) + else: + enew = e.func(m * x, -b) + measure = kwargs['measure'] + if measure(enew) <= kwargs['ratio'] * measure(e): + e = enew + except ValueError: + pass + return e.canonical + + def integrate(self, *args, **kwargs): + """See the integrate function in sympy.integrals""" + from sympy.integrals.integrals import integrate + return integrate(self, *args, **kwargs) + + def as_poly(self, *gens, **kwargs): + '''Returns lhs-rhs as a Poly + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x**2, 1).as_poly(x) + Poly(x**2 - 1, x, domain='ZZ') + ''' + return (self.lhs - self.rhs).as_poly(*gens, **kwargs) + + +Eq = Equality + + +class Unequality(Relational): + """An unequal relation between two objects. + + Explanation + =========== + + Represents that two objects are not equal. If they can be shown to be + definitively equal, this will reduce to False; if definitively unequal, + this will reduce to True. Otherwise, the relation is maintained as an + Unequality object. + + Examples + ======== + + >>> from sympy import Ne + >>> from sympy.abc import x, y + >>> Ne(y, x+x**2) + Ne(y, x**2 + x) + + See Also + ======== + Equality + + Notes + ===== + This class is not the same as the != operator. The != operator tests + for exact structural equality between two expressions; this class + compares expressions mathematically. + + This class is effectively the inverse of Equality. As such, it uses the + same algorithms, including any available `_eval_Eq` methods. + + """ + rel_op = '!=' + + __slots__ = () + + def __new__(cls, lhs, rhs, **options): + lhs = _sympify(lhs) + rhs = _sympify(rhs) + evaluate = options.pop('evaluate', global_parameters.evaluate) + if evaluate: + val = is_neq(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + return Relational.__new__(cls, lhs, rhs, **options) + + @classmethod + def _eval_relation(cls, lhs, rhs): + return _sympify(lhs != rhs) + + @property + def binary_symbols(self): + if S.true in self.args or S.false in self.args: + if self.lhs.is_Symbol: + return {self.lhs} + elif self.rhs.is_Symbol: + return {self.rhs} + return set() + + def _eval_simplify(self, **kwargs): + # simplify as an equality + eq = Equality(*self.args)._eval_simplify(**kwargs) + if isinstance(eq, Equality): + # send back Ne with the new args + return self.func(*eq.args) + return eq.negated # result of Ne is the negated Eq + + +Ne = Unequality + + +class _Inequality(Relational): + """Internal base class for all *Than types. + + Each subclass must implement _eval_relation to provide the method for + comparing two real numbers. + + """ + __slots__ = () + + def __new__(cls, lhs, rhs, **options): + + try: + lhs = _sympify(lhs) + rhs = _sympify(rhs) + except SympifyError: + return NotImplemented + + evaluate = options.pop('evaluate', global_parameters.evaluate) + if evaluate: + for me in (lhs, rhs): + if me.is_extended_real is False: + raise TypeError("Invalid comparison of non-real %s" % me) + if me is S.NaN: + raise TypeError("Invalid NaN comparison") + # First we invoke the appropriate inequality method of `lhs` + # (e.g., `lhs.__lt__`). That method will try to reduce to + # boolean or raise an exception. It may keep calling + # superclasses until it reaches `Expr` (e.g., `Expr.__lt__`). + # In some cases, `Expr` will just invoke us again (if neither it + # nor a subclass was able to reduce to boolean or raise an + # exception). In that case, it must call us with + # `evaluate=False` to prevent infinite recursion. + return cls._eval_relation(lhs, rhs, **options) + + # make a "non-evaluated" Expr for the inequality + return Relational.__new__(cls, lhs, rhs, **options) + + @classmethod + def _eval_relation(cls, lhs, rhs, **options): + val = cls._eval_fuzzy_relation(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + +class _Greater(_Inequality): + """Not intended for general use + + _Greater is only used so that GreaterThan and StrictGreaterThan may + subclass it for the .gts and .lts properties. + + """ + __slots__ = () + + @property + def gts(self): + return self._args[0] + + @property + def lts(self): + return self._args[1] + + +class _Less(_Inequality): + """Not intended for general use. + + _Less is only used so that LessThan and StrictLessThan may subclass it for + the .gts and .lts properties. + + """ + __slots__ = () + + @property + def gts(self): + return self._args[1] + + @property + def lts(self): + return self._args[0] + + +class GreaterThan(_Greater): + r"""Class representations of inequalities. + + Explanation + =========== + + The ``*Than`` classes represent inequal relationships, where the left-hand + side is generally bigger or smaller than the right-hand side. For example, + the GreaterThan class represents an inequal relationship where the + left-hand side is at least as big as the right side, if not bigger. In + mathematical notation: + + lhs $\ge$ rhs + + In total, there are four ``*Than`` classes, to represent the four + inequalities: + + +-----------------+--------+ + |Class Name | Symbol | + +=================+========+ + |GreaterThan | ``>=`` | + +-----------------+--------+ + |LessThan | ``<=`` | + +-----------------+--------+ + |StrictGreaterThan| ``>`` | + +-----------------+--------+ + |StrictLessThan | ``<`` | + +-----------------+--------+ + + All classes take two arguments, lhs and rhs. + + +----------------------------+-----------------+ + |Signature Example | Math Equivalent | + +============================+=================+ + |GreaterThan(lhs, rhs) | lhs $\ge$ rhs | + +----------------------------+-----------------+ + |LessThan(lhs, rhs) | lhs $\le$ rhs | + +----------------------------+-----------------+ + |StrictGreaterThan(lhs, rhs) | lhs $>$ rhs | + +----------------------------+-----------------+ + |StrictLessThan(lhs, rhs) | lhs $<$ rhs | + +----------------------------+-----------------+ + + In addition to the normal .lhs and .rhs of Relations, ``*Than`` inequality + objects also have the .lts and .gts properties, which represent the "less + than side" and "greater than side" of the operator. Use of .lts and .gts + in an algorithm rather than .lhs and .rhs as an assumption of inequality + direction will make more explicit the intent of a certain section of code, + and will make it similarly more robust to client code changes: + + >>> from sympy import GreaterThan, StrictGreaterThan + >>> from sympy import LessThan, StrictLessThan + >>> from sympy import And, Ge, Gt, Le, Lt, Rel, S + >>> from sympy.abc import x, y, z + >>> from sympy.core.relational import Relational + + >>> e = GreaterThan(x, 1) + >>> e + x >= 1 + >>> '%s >= %s is the same as %s <= %s' % (e.gts, e.lts, e.lts, e.gts) + 'x >= 1 is the same as 1 <= x' + + Examples + ======== + + One generally does not instantiate these classes directly, but uses various + convenience methods: + + >>> for f in [Ge, Gt, Le, Lt]: # convenience wrappers + ... print(f(x, 2)) + x >= 2 + x > 2 + x <= 2 + x < 2 + + Another option is to use the Python inequality operators (``>=``, ``>``, + ``<=``, ``<``) directly. Their main advantage over the ``Ge``, ``Gt``, + ``Le``, and ``Lt`` counterparts, is that one can write a more + "mathematical looking" statement rather than littering the math with + oddball function calls. However there are certain (minor) caveats of + which to be aware (search for 'gotcha', below). + + >>> x >= 2 + x >= 2 + >>> _ == Ge(x, 2) + True + + However, it is also perfectly valid to instantiate a ``*Than`` class less + succinctly and less conveniently: + + >>> Rel(x, 1, ">") + x > 1 + >>> Relational(x, 1, ">") + x > 1 + + >>> StrictGreaterThan(x, 1) + x > 1 + >>> GreaterThan(x, 1) + x >= 1 + >>> LessThan(x, 1) + x <= 1 + >>> StrictLessThan(x, 1) + x < 1 + + Notes + ===== + + There are a couple of "gotchas" to be aware of when using Python's + operators. + + The first is that what your write is not always what you get: + + >>> 1 < x + x > 1 + + Due to the order that Python parses a statement, it may + not immediately find two objects comparable. When ``1 < x`` + is evaluated, Python recognizes that the number 1 is a native + number and that x is *not*. Because a native Python number does + not know how to compare itself with a SymPy object + Python will try the reflective operation, ``x > 1`` and that is the + form that gets evaluated, hence returned. + + If the order of the statement is important (for visual output to + the console, perhaps), one can work around this annoyance in a + couple ways: + + (1) "sympify" the literal before comparison + + >>> S(1) < x + 1 < x + + (2) use one of the wrappers or less succinct methods described + above + + >>> Lt(1, x) + 1 < x + >>> Relational(1, x, "<") + 1 < x + + The second gotcha involves writing equality tests between relationals + when one or both sides of the test involve a literal relational: + + >>> e = x < 1; e + x < 1 + >>> e == e # neither side is a literal + True + >>> e == x < 1 # expecting True, too + False + >>> e != x < 1 # expecting False + x < 1 + >>> x < 1 != x < 1 # expecting False or the same thing as before + Traceback (most recent call last): + ... + TypeError: cannot determine truth value of Relational + + The solution for this case is to wrap literal relationals in + parentheses: + + >>> e == (x < 1) + True + >>> e != (x < 1) + False + >>> (x < 1) != (x < 1) + False + + The third gotcha involves chained inequalities not involving + ``==`` or ``!=``. Occasionally, one may be tempted to write: + + >>> e = x < y < z + Traceback (most recent call last): + ... + TypeError: symbolic boolean expression has no truth value. + + Due to an implementation detail or decision of Python [1]_, + there is no way for SymPy to create a chained inequality with + that syntax so one must use And: + + >>> e = And(x < y, y < z) + >>> type( e ) + And + >>> e + (x < y) & (y < z) + + Although this can also be done with the '&' operator, it cannot + be done with the 'and' operarator: + + >>> (x < y) & (y < z) + (x < y) & (y < z) + >>> (x < y) and (y < z) + Traceback (most recent call last): + ... + TypeError: cannot determine truth value of Relational + + .. [1] This implementation detail is that Python provides no reliable + method to determine that a chained inequality is being built. + Chained comparison operators are evaluated pairwise, using "and" + logic (see + https://docs.python.org/3/reference/expressions.html#not-in). This + is done in an efficient way, so that each object being compared + is only evaluated once and the comparison can short-circuit. For + example, ``1 > 2 > 3`` is evaluated by Python as ``(1 > 2) and (2 + > 3)``. The ``and`` operator coerces each side into a bool, + returning the object itself when it short-circuits. The bool of + the --Than operators will raise TypeError on purpose, because + SymPy cannot determine the mathematical ordering of symbolic + expressions. Thus, if we were to compute ``x > y > z``, with + ``x``, ``y``, and ``z`` being Symbols, Python converts the + statement (roughly) into these steps: + + (1) x > y > z + (2) (x > y) and (y > z) + (3) (GreaterThanObject) and (y > z) + (4) (GreaterThanObject.__bool__()) and (y > z) + (5) TypeError + + Because of the ``and`` added at step 2, the statement gets turned into a + weak ternary statement, and the first object's ``__bool__`` method will + raise TypeError. Thus, creating a chained inequality is not possible. + + In Python, there is no way to override the ``and`` operator, or to + control how it short circuits, so it is impossible to make something + like ``x > y > z`` work. There was a PEP to change this, + :pep:`335`, but it was officially closed in March, 2012. + + """ + __slots__ = () + + rel_op = '>=' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_ge(lhs, rhs) + + @property + def strict(self): + return Gt(*self.args) + +Ge = GreaterThan + + +class LessThan(_Less): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '<=' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_le(lhs, rhs) + + @property + def strict(self): + return Lt(*self.args) + +Le = LessThan + + +class StrictGreaterThan(_Greater): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '>' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_gt(lhs, rhs) + + @property + def weak(self): + return Ge(*self.args) + + +Gt = StrictGreaterThan + + +class StrictLessThan(_Less): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '<' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_lt(lhs, rhs) + + @property + def weak(self): + return Le(*self.args) + +Lt = StrictLessThan + +# A class-specific (not object-specific) data item used for a minor speedup. +# It is defined here, rather than directly in the class, because the classes +# that it references have not been defined until now (e.g. StrictLessThan). +Relational.ValidRelationOperator = { + None: Equality, + '==': Equality, + 'eq': Equality, + '!=': Unequality, + '<>': Unequality, + 'ne': Unequality, + '>=': GreaterThan, + 'ge': GreaterThan, + '<=': LessThan, + 'le': LessThan, + '>': StrictGreaterThan, + 'gt': StrictGreaterThan, + '<': StrictLessThan, + 'lt': StrictLessThan, +} + + +def _n2(a, b): + """Return (a - b).evalf(2) if a and b are comparable, else None. + This should only be used when a and b are already sympified. + """ + # /!\ it is very important (see issue 8245) not to + # use a re-evaluated number in the calculation of dif + if a.is_comparable and b.is_comparable: + dif = (a - b).evalf(2) + if dif.is_comparable: + return dif + + +@dispatch(Expr, Expr) +def _eval_is_ge(lhs, rhs): + return None + + +@dispatch(Basic, Basic) +def _eval_is_eq(lhs, rhs): + return None + + +@dispatch(Tuple, Expr) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return False + + +@dispatch(Tuple, AppliedUndef) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return None + + +@dispatch(Tuple, Symbol) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return None + + +@dispatch(Tuple, Tuple) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + if len(lhs) != len(rhs): + return False + + return fuzzy_and(fuzzy_bool(is_eq(s, o)) for s, o in zip(lhs, rhs)) + + +def is_lt(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is strictly less than rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return fuzzy_not(is_ge(lhs, rhs, assumptions)) + + +def is_gt(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is strictly greater than rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return fuzzy_not(is_le(lhs, rhs, assumptions)) + + +def is_le(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is less than or equal to rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return is_ge(rhs, lhs, assumptions) + + +def is_ge(lhs, rhs, assumptions=None): + """ + Fuzzy bool for *lhs* is greater than or equal to *rhs*. + + Parameters + ========== + + lhs : Expr + The left-hand side of the expression, must be sympified, + and an instance of expression. Throws an exception if + lhs is not an instance of expression. + + rhs : Expr + The right-hand side of the expression, must be sympified + and an instance of expression. Throws an exception if + lhs is not an instance of expression. + + assumptions: Boolean, optional + Assumptions taken to evaluate the inequality. + + Returns + ======= + + ``True`` if *lhs* is greater than or equal to *rhs*, ``False`` if *lhs* + is less than *rhs*, and ``None`` if the comparison between *lhs* and + *rhs* is indeterminate. + + Explanation + =========== + + This function is intended to give a relatively fast determination and + deliberately does not attempt slow calculations that might help in + obtaining a determination of True or False in more difficult cases. + + The four comparison functions ``is_le``, ``is_lt``, ``is_ge``, and ``is_gt`` are + each implemented in terms of ``is_ge`` in the following way: + + is_ge(x, y) := is_ge(x, y) + is_le(x, y) := is_ge(y, x) + is_lt(x, y) := fuzzy_not(is_ge(x, y)) + is_gt(x, y) := fuzzy_not(is_ge(y, x)) + + Therefore, supporting new type with this function will ensure behavior for + other three functions as well. + + To maintain these equivalences in fuzzy logic it is important that in cases where + either x or y is non-real all comparisons will give None. + + Examples + ======== + + >>> from sympy import S, Q + >>> from sympy.core.relational import is_ge, is_le, is_gt, is_lt + >>> from sympy.abc import x + >>> is_ge(S(2), S(0)) + True + >>> is_ge(S(0), S(2)) + False + >>> is_le(S(0), S(2)) + True + >>> is_gt(S(0), S(2)) + False + >>> is_lt(S(2), S(0)) + False + + Assumptions can be passed to evaluate the quality which is otherwise + indeterminate. + + >>> print(is_ge(x, S(0))) + None + >>> is_ge(x, S(0), assumptions=Q.positive(x)) + True + + New types can be supported by dispatching to ``_eval_is_ge``. + + >>> from sympy import Expr, sympify + >>> from sympy.multipledispatch import dispatch + >>> class MyExpr(Expr): + ... def __new__(cls, arg): + ... return super().__new__(cls, sympify(arg)) + ... @property + ... def value(self): + ... return self.args[0] + >>> @dispatch(MyExpr, MyExpr) + ... def _eval_is_ge(a, b): + ... return is_ge(a.value, b.value) + >>> a = MyExpr(1) + >>> b = MyExpr(2) + >>> is_ge(b, a) + True + >>> is_le(a, b) + True + """ + from sympy.assumptions.wrapper import AssumptionsWrapper, is_extended_nonnegative + + if not (isinstance(lhs, Expr) and isinstance(rhs, Expr)): + raise TypeError("Can only compare inequalities with Expr") + + retval = _eval_is_ge(lhs, rhs) + + if retval is not None: + return retval + else: + n2 = _n2(lhs, rhs) + if n2 is not None: + # use float comparison for infinity. + # otherwise get stuck in infinite recursion + if n2 in (S.Infinity, S.NegativeInfinity): + n2 = float(n2) + return n2 >= 0 + + _lhs = AssumptionsWrapper(lhs, assumptions) + _rhs = AssumptionsWrapper(rhs, assumptions) + if _lhs.is_extended_real and _rhs.is_extended_real: + if (_lhs.is_infinite and _lhs.is_extended_positive) or (_rhs.is_infinite and _rhs.is_extended_negative): + return True + diff = lhs - rhs + if diff is not S.NaN: + rv = is_extended_nonnegative(diff, assumptions) + if rv is not None: + return rv + + +def is_neq(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs does not equal rhs. + + See the docstring for :func:`~.is_eq` for more. + """ + return fuzzy_not(is_eq(lhs, rhs, assumptions)) + + +def is_eq(lhs, rhs, assumptions=None): + """ + Fuzzy bool representing mathematical equality between *lhs* and *rhs*. + + Parameters + ========== + + lhs : Expr + The left-hand side of the expression, must be sympified. + + rhs : Expr + The right-hand side of the expression, must be sympified. + + assumptions: Boolean, optional + Assumptions taken to evaluate the equality. + + Returns + ======= + + ``True`` if *lhs* is equal to *rhs*, ``False`` is *lhs* is not equal to *rhs*, + and ``None`` if the comparison between *lhs* and *rhs* is indeterminate. + + Explanation + =========== + + This function is intended to give a relatively fast determination and + deliberately does not attempt slow calculations that might help in + obtaining a determination of True or False in more difficult cases. + + :func:`~.is_neq` calls this function to return its value, so supporting + new type with this function will ensure correct behavior for ``is_neq`` + as well. + + Examples + ======== + + >>> from sympy import Q, S + >>> from sympy.core.relational import is_eq, is_neq + >>> from sympy.abc import x + >>> is_eq(S(0), S(0)) + True + >>> is_neq(S(0), S(0)) + False + >>> is_eq(S(0), S(2)) + False + >>> is_neq(S(0), S(2)) + True + + Assumptions can be passed to evaluate the equality which is otherwise + indeterminate. + + >>> print(is_eq(x, S(0))) + None + >>> is_eq(x, S(0), assumptions=Q.zero(x)) + True + + New types can be supported by dispatching to ``_eval_is_eq``. + + >>> from sympy import Basic, sympify + >>> from sympy.multipledispatch import dispatch + >>> class MyBasic(Basic): + ... def __new__(cls, arg): + ... return Basic.__new__(cls, sympify(arg)) + ... @property + ... def value(self): + ... return self.args[0] + ... + >>> @dispatch(MyBasic, MyBasic) + ... def _eval_is_eq(a, b): + ... return is_eq(a.value, b.value) + ... + >>> a = MyBasic(1) + >>> b = MyBasic(1) + >>> is_eq(a, b) + True + >>> is_neq(a, b) + False + + """ + # here, _eval_Eq is only called for backwards compatibility + # new code should use is_eq with multiple dispatch as + # outlined in the docstring + for side1, side2 in (lhs, rhs), (rhs, lhs): + eval_func = getattr(side1, '_eval_Eq', None) + if eval_func is not None: + retval = eval_func(side2) + if retval is not None: + return retval + + retval = _eval_is_eq(lhs, rhs) + if retval is not None: + return retval + + if dispatch(type(lhs), type(rhs)) != dispatch(type(rhs), type(lhs)): + retval = _eval_is_eq(rhs, lhs) + if retval is not None: + return retval + + # retval is still None, so go through the equality logic + # If expressions have the same structure, they must be equal. + if lhs == rhs: + return True # e.g. True == True + elif all(isinstance(i, BooleanAtom) for i in (rhs, lhs)): + return False # True != False + elif not (lhs.is_Symbol or rhs.is_Symbol) and ( + isinstance(lhs, Boolean) != + isinstance(rhs, Boolean)): + return False # only Booleans can equal Booleans + + from sympy.assumptions.wrapper import (AssumptionsWrapper, + is_infinite, is_extended_real) + from .add import Add + + _lhs = AssumptionsWrapper(lhs, assumptions) + _rhs = AssumptionsWrapper(rhs, assumptions) + + if _lhs.is_infinite or _rhs.is_infinite: + if fuzzy_xor([_lhs.is_infinite, _rhs.is_infinite]): + return False + if fuzzy_xor([_lhs.is_extended_real, _rhs.is_extended_real]): + return False + if fuzzy_and([_lhs.is_extended_real, _rhs.is_extended_real]): + return fuzzy_xor([_lhs.is_extended_positive, fuzzy_not(_rhs.is_extended_positive)]) + + # Try to split real/imaginary parts and equate them + I = S.ImaginaryUnit + + def split_real_imag(expr): + real_imag = lambda t: ( + 'real' if is_extended_real(t, assumptions) else + 'imag' if is_extended_real(I*t, assumptions) else None) + return sift(Add.make_args(expr), real_imag) + + lhs_ri = split_real_imag(lhs) + if not lhs_ri[None]: + rhs_ri = split_real_imag(rhs) + if not rhs_ri[None]: + eq_real = is_eq(Add(*lhs_ri['real']), Add(*rhs_ri['real']), assumptions) + eq_imag = is_eq(I * Add(*lhs_ri['imag']), I * Add(*rhs_ri['imag']), assumptions) + return fuzzy_and(map(fuzzy_bool, [eq_real, eq_imag])) + + from sympy.functions.elementary.complexes import arg + # Compare e.g. zoo with 1+I*oo by comparing args + arglhs = arg(lhs) + argrhs = arg(rhs) + # Guard against Eq(nan, nan) -> False + if not (arglhs == S.NaN and argrhs == S.NaN): + return fuzzy_bool(is_eq(arglhs, argrhs, assumptions)) + + if all(isinstance(i, Expr) for i in (lhs, rhs)): + # see if the difference evaluates + dif = lhs - rhs + _dif = AssumptionsWrapper(dif, assumptions) + z = _dif.is_zero + if z is not None: + if z is False and _dif.is_commutative: # issue 10728 + return False + if z: + return True + + # is_zero cannot help decide integer/rational with Float + c, t = dif.as_coeff_Add() + if c.is_Float: + if int_valued(c): + if t.is_integer is False: + return False + elif t.is_rational is False: + return False + + n2 = _n2(lhs, rhs) + if n2 is not None: + return _sympify(n2 == 0) + + # see if the ratio evaluates + n, d = dif.as_numer_denom() + rv = None + _n = AssumptionsWrapper(n, assumptions) + _d = AssumptionsWrapper(d, assumptions) + if _n.is_zero: + rv = _d.is_nonzero + elif _n.is_finite: + if _d.is_infinite: + rv = True + elif _n.is_zero is False: + rv = _d.is_infinite + if rv is None: + # if the condition that makes the denominator + # infinite does not make the original expression + # True then False can be returned + from sympy.simplify.simplify import clear_coefficients + l, r = clear_coefficients(d, S.Infinity) + args = [_.subs(l, r) for _ in (lhs, rhs)] + if args != [lhs, rhs]: + rv = fuzzy_bool(is_eq(*args, assumptions)) + if rv is True: + rv = None + elif any(is_infinite(a, assumptions) for a in Add.make_args(n)): + # (inf or nan)/x != 0 + rv = False + if rv is not None: + return rv diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/rules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/rules.py new file mode 100644 index 0000000000000000000000000000000000000000..5ae331f71b21c8a6ef35f499c5c5c89239349e9c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/rules.py @@ -0,0 +1,66 @@ +""" +Replacement rules. +""" + +class Transform: + """ + Immutable mapping that can be used as a generic transformation rule. + + Parameters + ========== + + transform : callable + Computes the value corresponding to any key. + + filter : callable, optional + If supplied, specifies which objects are in the mapping. + + Examples + ======== + + >>> from sympy.core.rules import Transform + >>> from sympy.abc import x + + This Transform will return, as a value, one more than the key: + + >>> add1 = Transform(lambda x: x + 1) + >>> add1[1] + 2 + >>> add1[x] + x + 1 + + By default, all values are considered to be in the dictionary. If a filter + is supplied, only the objects for which it returns True are considered as + being in the dictionary: + + >>> add1_odd = Transform(lambda x: x + 1, lambda x: x%2 == 1) + >>> 2 in add1_odd + False + >>> add1_odd.get(2, 0) + 0 + >>> 3 in add1_odd + True + >>> add1_odd[3] + 4 + >>> add1_odd.get(3, 0) + 4 + """ + + def __init__(self, transform, filter=lambda x: True): + self._transform = transform + self._filter = filter + + def __contains__(self, item): + return self._filter(item) + + def __getitem__(self, key): + if self._filter(key): + return self._transform(key) + else: + raise KeyError(key) + + def get(self, item, default=None): + if item in self: + return self[item] + else: + return default diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/singleton.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/singleton.py new file mode 100644 index 0000000000000000000000000000000000000000..e8b9df959393270140bc3ef11b3d9a4e948c5e80 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/singleton.py @@ -0,0 +1,199 @@ +"""Singleton mechanism""" + +from __future__ import annotations + +from typing import TYPE_CHECKING + +from .core import Registry +from .sympify import sympify + + +if TYPE_CHECKING: + from sympy.core.numbers import ( + Zero as _Zero, + One as _One, + NegativeOne as _NegativeOne, + Half as _Half, + Infinity as _Infinity, + NegativeInfinity as _NegativeInfinity, + ComplexInfinity as _ComplexInfinity, + NaN as _NaN, + ) + + +class SingletonRegistry(Registry): + """ + The registry for the singleton classes (accessible as ``S``). + + Explanation + =========== + + This class serves as two separate things. + + The first thing it is is the ``SingletonRegistry``. Several classes in + SymPy appear so often that they are singletonized, that is, using some + metaprogramming they are made so that they can only be instantiated once + (see the :class:`sympy.core.singleton.Singleton` class for details). For + instance, every time you create ``Integer(0)``, this will return the same + instance, :class:`sympy.core.numbers.Zero`. All singleton instances are + attributes of the ``S`` object, so ``Integer(0)`` can also be accessed as + ``S.Zero``. + + Singletonization offers two advantages: it saves memory, and it allows + fast comparison. It saves memory because no matter how many times the + singletonized objects appear in expressions in memory, they all point to + the same single instance in memory. The fast comparison comes from the + fact that you can use ``is`` to compare exact instances in Python + (usually, you need to use ``==`` to compare things). ``is`` compares + objects by memory address, and is very fast. + + Examples + ======== + + >>> from sympy import S, Integer + >>> a = Integer(0) + >>> a is S.Zero + True + + For the most part, the fact that certain objects are singletonized is an + implementation detail that users should not need to worry about. In SymPy + library code, ``is`` comparison is often used for performance purposes + The primary advantage of ``S`` for end users is the convenient access to + certain instances that are otherwise difficult to type, like ``S.Half`` + (instead of ``Rational(1, 2)``). + + When using ``is`` comparison, make sure the argument is sympified. For + instance, + + >>> x = 0 + >>> x is S.Zero + False + + This problem is not an issue when using ``==``, which is recommended for + most use-cases: + + >>> 0 == S.Zero + True + + The second thing ``S`` is is a shortcut for + :func:`sympy.core.sympify.sympify`. :func:`sympy.core.sympify.sympify` is + the function that converts Python objects such as ``int(1)`` into SymPy + objects such as ``Integer(1)``. It also converts the string form of an + expression into a SymPy expression, like ``sympify("x**2")`` -> + ``Symbol("x")**2``. ``S(1)`` is the same thing as ``sympify(1)`` + (basically, ``S.__call__`` has been defined to call ``sympify``). + + This is for convenience, since ``S`` is a single letter. It's mostly + useful for defining rational numbers. Consider an expression like ``x + + 1/2``. If you enter this directly in Python, it will evaluate the ``1/2`` + and give ``0.5``, because both arguments are ints (see also + :ref:`tutorial-gotchas-final-notes`). However, in SymPy, you usually want + the quotient of two integers to give an exact rational number. The way + Python's evaluation works, at least one side of an operator needs to be a + SymPy object for the SymPy evaluation to take over. You could write this + as ``x + Rational(1, 2)``, but this is a lot more typing. A shorter + version is ``x + S(1)/2``. Since ``S(1)`` returns ``Integer(1)``, the + division will return a ``Rational`` type, since it will call + ``Integer.__truediv__``, which knows how to return a ``Rational``. + + """ + __slots__ = () + + Zero: _Zero + One: _One + NegativeOne: _NegativeOne + Half: _Half + Infinity: _Infinity + NegativeInfinity: _NegativeInfinity + ComplexInfinity: _ComplexInfinity + NaN: _NaN + + # Also allow things like S(5) + __call__ = staticmethod(sympify) + + def __init__(self): + self._classes_to_install = {} + # Dict of classes that have been registered, but that have not have been + # installed as an attribute of this SingletonRegistry. + # Installation automatically happens at the first attempt to access the + # attribute. + # The purpose of this is to allow registration during class + # initialization during import, but not trigger object creation until + # actual use (which should not happen until after all imports are + # finished). + + def register(self, cls): + # Make sure a duplicate class overwrites the old one + if hasattr(self, cls.__name__): + delattr(self, cls.__name__) + self._classes_to_install[cls.__name__] = cls + + def __getattr__(self, name): + """Python calls __getattr__ if no attribute of that name was installed + yet. + + Explanation + =========== + + This __getattr__ checks whether a class with the requested name was + already registered but not installed; if no, raises an AttributeError. + Otherwise, retrieves the class, calculates its singleton value, installs + it as an attribute of the given name, and unregisters the class.""" + if name not in self._classes_to_install: + raise AttributeError( + "Attribute '%s' was not installed on SymPy registry %s" % ( + name, self)) + class_to_install = self._classes_to_install[name] + value_to_install = class_to_install() + self.__setattr__(name, value_to_install) + del self._classes_to_install[name] + return value_to_install + + def __repr__(self): + return "S" + +S = SingletonRegistry() + + +class Singleton(type): + """ + Metaclass for singleton classes. + + Explanation + =========== + + A singleton class has only one instance which is returned every time the + class is instantiated. Additionally, this instance can be accessed through + the global registry object ``S`` as ``S.``. + + Examples + ======== + + >>> from sympy import S, Basic + >>> from sympy.core.singleton import Singleton + >>> class MySingleton(Basic, metaclass=Singleton): + ... pass + >>> Basic() is Basic() + False + >>> MySingleton() is MySingleton() + True + >>> S.MySingleton is MySingleton() + True + + Notes + ===== + + Instance creation is delayed until the first time the value is accessed. + (SymPy versions before 1.0 would create the instance during class + creation time, which would be prone to import cycles.) + """ + def __init__(cls, *args, **kwargs): + cls._instance = obj = Basic.__new__(cls) + cls.__new__ = lambda cls: obj + cls.__getnewargs__ = lambda obj: () + cls.__getstate__ = lambda obj: None + S.register(cls) + + +# Delayed to avoid cyclic import +from .basic import Basic diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sorting.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sorting.py new file mode 100644 index 0000000000000000000000000000000000000000..399a7efa1f6cbe1ebdf6307c14b411df36fc7de0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sorting.py @@ -0,0 +1,312 @@ +from collections import defaultdict + +from .sympify import sympify, SympifyError +from sympy.utilities.iterables import iterable, uniq + + +__all__ = ['default_sort_key', 'ordered'] + + +def default_sort_key(item, order=None): + """Return a key that can be used for sorting. + + The key has the structure: + + (class_key, (len(args), args), exponent.sort_key(), coefficient) + + This key is supplied by the sort_key routine of Basic objects when + ``item`` is a Basic object or an object (other than a string) that + sympifies to a Basic object. Otherwise, this function produces the + key. + + The ``order`` argument is passed along to the sort_key routine and is + used to determine how the terms *within* an expression are ordered. + (See examples below) ``order`` options are: 'lex', 'grlex', 'grevlex', + and reversed values of the same (e.g. 'rev-lex'). The default order + value is None (which translates to 'lex'). + + Examples + ======== + + >>> from sympy import S, I, default_sort_key, sin, cos, sqrt + >>> from sympy.core.function import UndefinedFunction + >>> from sympy.abc import x + + The following are equivalent ways of getting the key for an object: + + >>> x.sort_key() == default_sort_key(x) + True + + Here are some examples of the key that is produced: + + >>> default_sort_key(UndefinedFunction('f')) + ((0, 0, 'UndefinedFunction'), (1, ('f',)), ((1, 0, 'Number'), + (0, ()), (), 1), 1) + >>> default_sort_key('1') + ((0, 0, 'str'), (1, ('1',)), ((1, 0, 'Number'), (0, ()), (), 1), 1) + >>> default_sort_key(S.One) + ((1, 0, 'Number'), (0, ()), (), 1) + >>> default_sort_key(2) + ((1, 0, 'Number'), (0, ()), (), 2) + + While sort_key is a method only defined for SymPy objects, + default_sort_key will accept anything as an argument so it is + more robust as a sorting key. For the following, using key= + lambda i: i.sort_key() would fail because 2 does not have a sort_key + method; that's why default_sort_key is used. Note, that it also + handles sympification of non-string items likes ints: + + >>> a = [2, I, -I] + >>> sorted(a, key=default_sort_key) + [2, -I, I] + + The returned key can be used anywhere that a key can be specified for + a function, e.g. sort, min, max, etc...: + + >>> a.sort(key=default_sort_key); a[0] + 2 + >>> min(a, key=default_sort_key) + 2 + + Notes + ===== + + The key returned is useful for getting items into a canonical order + that will be the same across platforms. It is not directly useful for + sorting lists of expressions: + + >>> a, b = x, 1/x + + Since ``a`` has only 1 term, its value of sort_key is unaffected by + ``order``: + + >>> a.sort_key() == a.sort_key('rev-lex') + True + + If ``a`` and ``b`` are combined then the key will differ because there + are terms that can be ordered: + + >>> eq = a + b + >>> eq.sort_key() == eq.sort_key('rev-lex') + False + >>> eq.as_ordered_terms() + [x, 1/x] + >>> eq.as_ordered_terms('rev-lex') + [1/x, x] + + But since the keys for each of these terms are independent of ``order``'s + value, they do not sort differently when they appear separately in a list: + + >>> sorted(eq.args, key=default_sort_key) + [1/x, x] + >>> sorted(eq.args, key=lambda i: default_sort_key(i, order='rev-lex')) + [1/x, x] + + The order of terms obtained when using these keys is the order that would + be obtained if those terms were *factors* in a product. + + Although it is useful for quickly putting expressions in canonical order, + it does not sort expressions based on their complexity defined by the + number of operations, power of variables and others: + + >>> sorted([sin(x)*cos(x), sin(x)], key=default_sort_key) + [sin(x)*cos(x), sin(x)] + >>> sorted([x, x**2, sqrt(x), x**3], key=default_sort_key) + [sqrt(x), x, x**2, x**3] + + See Also + ======== + + ordered, sympy.core.expr.Expr.as_ordered_factors, sympy.core.expr.Expr.as_ordered_terms + + """ + from .basic import Basic + from .singleton import S + + if isinstance(item, Basic): + return item.sort_key(order=order) + + if iterable(item, exclude=str): + if isinstance(item, dict): + args = item.items() + unordered = True + elif isinstance(item, set): + args = item + unordered = True + else: + # e.g. tuple, list + args = list(item) + unordered = False + + args = [default_sort_key(arg, order=order) for arg in args] + + if unordered: + # e.g. dict, set + args = sorted(args) + + cls_index, args = 10, (len(args), tuple(args)) + else: + if not isinstance(item, str): + try: + item = sympify(item, strict=True) + except SympifyError: + # e.g. lambda x: x + pass + else: + if isinstance(item, Basic): + # e.g int -> Integer + return default_sort_key(item) + # e.g. UndefinedFunction + + # e.g. str + cls_index, args = 0, (1, (str(item),)) + + return (cls_index, 0, item.__class__.__name__ + ), args, S.One.sort_key(), S.One + + +def _node_count(e): + # this not only counts nodes, it affirms that the + # args are Basic (i.e. have an args property). If + # some object has a non-Basic arg, it needs to be + # fixed since it is intended that all Basic args + # are of Basic type (though this is not easy to enforce). + if e.is_Float: + return 0.5 + return 1 + sum(map(_node_count, e.args)) + + +def _nodes(e): + """ + A helper for ordered() which returns the node count of ``e`` which + for Basic objects is the number of Basic nodes in the expression tree + but for other objects is 1 (unless the object is an iterable or dict + for which the sum of nodes is returned). + """ + from .basic import Basic + from .function import Derivative + + if isinstance(e, Basic): + if isinstance(e, Derivative): + return _nodes(e.expr) + sum(i[1] if i[1].is_Number else + _nodes(i[1]) for i in e.variable_count) + return _node_count(e) + elif iterable(e): + return 1 + sum(_nodes(ei) for ei in e) + elif isinstance(e, dict): + return 1 + sum(_nodes(k) + _nodes(v) for k, v in e.items()) + else: + return 1 + + +def ordered(seq, keys=None, default=True, warn=False): + """Return an iterator of the seq where keys are used to break ties + in a conservative fashion: if, after applying a key, there are no + ties then no other keys will be computed. + + Two default keys will be applied if 1) keys are not provided or + 2) the given keys do not resolve all ties (but only if ``default`` + is True). The two keys are ``_nodes`` (which places smaller + expressions before large) and ``default_sort_key`` which (if the + ``sort_key`` for an object is defined properly) should resolve + any ties. This strategy is similar to sorting done by + ``Basic.compare``, but differs in that ``ordered`` never makes a + decision based on an objects name. + + If ``warn`` is True then an error will be raised if there were no + keys remaining to break ties. This can be used if it was expected that + there should be no ties between items that are not identical. + + Examples + ======== + + >>> from sympy import ordered, count_ops + >>> from sympy.abc import x, y + + The count_ops is not sufficient to break ties in this list and the first + two items appear in their original order (i.e. the sorting is stable): + + >>> list(ordered([y + 2, x + 2, x**2 + y + 3], + ... count_ops, default=False, warn=False)) + ... + [y + 2, x + 2, x**2 + y + 3] + + The default_sort_key allows the tie to be broken: + + >>> list(ordered([y + 2, x + 2, x**2 + y + 3])) + ... + [x + 2, y + 2, x**2 + y + 3] + + Here, sequences are sorted by length, then sum: + + >>> seq, keys = [[[1, 2, 1], [0, 3, 1], [1, 1, 3], [2], [1]], [ + ... lambda x: len(x), + ... lambda x: sum(x)]] + ... + >>> list(ordered(seq, keys, default=False, warn=False)) + [[1], [2], [1, 2, 1], [0, 3, 1], [1, 1, 3]] + + If ``warn`` is True, an error will be raised if there were not + enough keys to break ties: + + >>> list(ordered(seq, keys, default=False, warn=True)) + Traceback (most recent call last): + ... + ValueError: not enough keys to break ties + + + Notes + ===== + + The decorated sort is one of the fastest ways to sort a sequence for + which special item comparison is desired: the sequence is decorated, + sorted on the basis of the decoration (e.g. making all letters lower + case) and then undecorated. If one wants to break ties for items that + have the same decorated value, a second key can be used. But if the + second key is expensive to compute then it is inefficient to decorate + all items with both keys: only those items having identical first key + values need to be decorated. This function applies keys successively + only when needed to break ties. By yielding an iterator, use of the + tie-breaker is delayed as long as possible. + + This function is best used in cases when use of the first key is + expected to be a good hashing function; if there are no unique hashes + from application of a key, then that key should not have been used. The + exception, however, is that even if there are many collisions, if the + first group is small and one does not need to process all items in the + list then time will not be wasted sorting what one was not interested + in. For example, if one were looking for the minimum in a list and + there were several criteria used to define the sort order, then this + function would be good at returning that quickly if the first group + of candidates is small relative to the number of items being processed. + + """ + + d = defaultdict(list) + if keys: + if isinstance(keys, (list, tuple)): + keys = list(keys) + f = keys.pop(0) + else: + f = keys + keys = [] + for a in seq: + d[f(a)].append(a) + else: + if not default: + raise ValueError('if default=False then keys must be provided') + d[None].extend(seq) + + for k, value in sorted(d.items()): + if len(value) > 1: + if keys: + value = ordered(value, keys, default, warn) + elif default: + value = ordered(value, (_nodes, default_sort_key,), + default=False, warn=warn) + elif warn: + u = list(uniq(value)) + if len(u) > 1: + raise ValueError( + 'not enough keys to break ties: %s' % u) + yield from value diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/symbol.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/symbol.py new file mode 100644 index 0000000000000000000000000000000000000000..2e03ff0c84c1668b70ec5b3d7f8bc854a2e5e4ac --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/symbol.py @@ -0,0 +1,993 @@ +from __future__ import annotations + + +from .assumptions import StdFactKB, _assume_defined +from .basic import Basic, Atom +from .cache import cacheit +from .containers import Tuple +from .expr import Expr, AtomicExpr +from .function import AppliedUndef, FunctionClass +from .kind import NumberKind, UndefinedKind +from .logic import fuzzy_bool +from .singleton import S +from .sorting import ordered +from .sympify import sympify +from sympy.logic.boolalg import Boolean +from sympy.utilities.iterables import sift, is_sequence +from sympy.utilities.misc import filldedent + +import string +import re as _re +import random +from itertools import product +from typing import Any + + +class Str(Atom): + """ + Represents string in SymPy. + + Explanation + =========== + + Previously, ``Symbol`` was used where string is needed in ``args`` of SymPy + objects, e.g. denoting the name of the instance. However, since ``Symbol`` + represents mathematical scalar, this class should be used instead. + + """ + __slots__ = ('name',) + + def __new__(cls, name, **kwargs): + if not isinstance(name, str): + raise TypeError("name should be a string, not %s" % repr(type(name))) + obj = Expr.__new__(cls, **kwargs) + obj.name = name + return obj + + def __getnewargs__(self): + return (self.name,) + + def _hashable_content(self): + return (self.name,) + + +def _filter_assumptions(kwargs): + """Split the given dict into assumptions and non-assumptions. + Keys are taken as assumptions if they correspond to an + entry in ``_assume_defined``. + """ + assumptions, nonassumptions = map(dict, sift(kwargs.items(), + lambda i: i[0] in _assume_defined, + binary=True)) + Symbol._sanitize(assumptions) + return assumptions, nonassumptions + +def _symbol(s, matching_symbol=None, **assumptions): + """Return s if s is a Symbol, else if s is a string, return either + the matching_symbol if the names are the same or else a new symbol + with the same assumptions as the matching symbol (or the + assumptions as provided). + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.core.symbol import _symbol + >>> _symbol('y') + y + >>> _.is_real is None + True + >>> _symbol('y', real=True).is_real + True + + >>> x = Symbol('x') + >>> _symbol(x, real=True) + x + >>> _.is_real is None # ignore attribute if s is a Symbol + True + + Below, the variable sym has the name 'foo': + + >>> sym = Symbol('foo', real=True) + + Since 'x' is not the same as sym's name, a new symbol is created: + + >>> _symbol('x', sym).name + 'x' + + It will acquire any assumptions give: + + >>> _symbol('x', sym, real=False).is_real + False + + Since 'foo' is the same as sym's name, sym is returned + + >>> _symbol('foo', sym) + foo + + Any assumptions given are ignored: + + >>> _symbol('foo', sym, real=False).is_real + True + + NB: the symbol here may not be the same as a symbol with the same + name defined elsewhere as a result of different assumptions. + + See Also + ======== + + sympy.core.symbol.Symbol + + """ + if isinstance(s, str): + if matching_symbol and matching_symbol.name == s: + return matching_symbol + return Symbol(s, **assumptions) + elif isinstance(s, Symbol): + return s + else: + raise ValueError('symbol must be string for symbol name or Symbol') + +def uniquely_named_symbol(xname, exprs=(), compare=str, modify=None, **assumptions): + """ + Return a symbol whose name is derivated from *xname* but is unique + from any other symbols in *exprs*. + + *xname* and symbol names in *exprs* are passed to *compare* to be + converted to comparable forms. If ``compare(xname)`` is not unique, + it is recursively passed to *modify* until unique name is acquired. + + Parameters + ========== + + xname : str or Symbol + Base name for the new symbol. + + exprs : Expr or iterable of Expr + Expressions whose symbols are compared to *xname*. + + compare : function + Unary function which transforms *xname* and symbol names from + *exprs* to comparable form. + + modify : function + Unary function which modifies the string. Default is appending + the number, or increasing the number if exists. + + Examples + ======== + + By default, a number is appended to *xname* to generate unique name. + If the number already exists, it is recursively increased. + + >>> from sympy.core.symbol import uniquely_named_symbol, Symbol + >>> uniquely_named_symbol('x', Symbol('x')) + x0 + >>> uniquely_named_symbol('x', (Symbol('x'), Symbol('x0'))) + x1 + >>> uniquely_named_symbol('x0', (Symbol('x1'), Symbol('x0'))) + x2 + + Name generation can be controlled by passing *modify* parameter. + + >>> from sympy.abc import x + >>> uniquely_named_symbol('x', x, modify=lambda s: 2*s) + xx + + """ + def numbered_string_incr(s, start=0): + if not s: + return str(start) + i = len(s) - 1 + while i != -1: + if not s[i].isdigit(): + break + i -= 1 + n = str(int(s[i + 1:] or start - 1) + 1) + return s[:i + 1] + n + + default = None + if is_sequence(xname): + xname, default = xname + x = compare(xname) + if not exprs: + return _symbol(x, default, **assumptions) + if not is_sequence(exprs): + exprs = [exprs] + names = set().union( + [i.name for e in exprs for i in e.atoms(Symbol)] + + [i.func.name for e in exprs for i in e.atoms(AppliedUndef)]) + if modify is None: + modify = numbered_string_incr + while any(x == compare(s) for s in names): + x = modify(x) + return _symbol(x, default, **assumptions) +_uniquely_named_symbol = uniquely_named_symbol + + +# XXX: We need type: ignore below because Expr and Boolean are incompatible as +# superclasses. Really Symbol should not be a subclass of Boolean. + + +class Symbol(AtomicExpr, Boolean): # type: ignore + """ + Symbol class is used to create symbolic variables. + + Explanation + =========== + + Symbolic variables are placeholders for mathematical symbols that can represent numbers, constants, or any other mathematical entities and can be used in mathematical expressions and to perform symbolic computations. + + Assumptions: + + commutative = True + positive = True + real = True + imaginary = True + complex = True + complete list of more assumptions- :ref:`predicates` + + You can override the default assumptions in the constructor. + + Examples + ======== + + >>> from sympy import Symbol + >>> x = Symbol("x", positive=True) + >>> x.is_positive + True + >>> x.is_negative + False + + passing in greek letters: + + >>> from sympy import Symbol + >>> alpha = Symbol('alpha') + >>> alpha #doctest: +SKIP + α + + Trailing digits are automatically treated like subscripts of what precedes them in the name. + General format to add subscript to a symbol : + `` = Symbol('_')`` + + >>> from sympy import Symbol + >>> alpha_i = Symbol('alpha_i') + >>> alpha_i #doctest: +SKIP + αᵢ + + Parameters + ========== + + AtomicExpr: variable name + Boolean: Assumption with a boolean value(True or False) + """ + + is_comparable = False + + __slots__ = ('name', '_assumptions_orig', '_assumptions0') + + name: str + + is_Symbol = True + is_symbol = True + + @property + def kind(self): + if self.is_commutative: + return NumberKind + return UndefinedKind + + @property + def _diff_wrt(self): + """Allow derivatives wrt Symbols. + + Examples + ======== + + >>> from sympy import Symbol + >>> x = Symbol('x') + >>> x._diff_wrt + True + """ + return True + + @staticmethod + def _sanitize(assumptions, obj=None): + """Remove None, convert values to bool, check commutativity *in place*. + """ + + # be strict about commutativity: cannot be None + is_commutative = fuzzy_bool(assumptions.get('commutative', True)) + if is_commutative is None: + whose = '%s ' % obj.__name__ if obj else '' + raise ValueError( + '%scommutativity must be True or False.' % whose) + + # sanitize other assumptions so 1 -> True and 0 -> False + for key in list(assumptions.keys()): + v = assumptions[key] + if v is None: + assumptions.pop(key) + continue + assumptions[key] = bool(v) + + def _merge(self, assumptions): + base = self.assumptions0 + for k in set(assumptions) & set(base): + if assumptions[k] != base[k]: + raise ValueError(filldedent(''' + non-matching assumptions for %s: existing value + is %s and new value is %s''' % ( + k, base[k], assumptions[k]))) + base.update(assumptions) + return base + + def __new__(cls, name, **assumptions): + """Symbols are identified by name and assumptions:: + + >>> from sympy import Symbol + >>> Symbol("x") == Symbol("x") + True + >>> Symbol("x", real=True) == Symbol("x", real=False) + False + + """ + cls._sanitize(assumptions, cls) + return Symbol.__xnew_cached_(cls, name, **assumptions) + + + @staticmethod + @cacheit + def _canonical_assumptions(**assumptions): + # This is retained purely so that srepr can include commutative=True if + # that was explicitly specified but not if it was not. Ideally srepr + # should not distinguish these cases because the symbols otherwise + # compare equal and are considered equivalent. + # + # See https://github.com/sympy/sympy/issues/8873 + # + assumptions_orig = assumptions.copy() + + # The only assumption that is assumed by default is commutative=True: + assumptions.setdefault('commutative', True) + + assumptions_kb = StdFactKB(assumptions) + assumptions0 = dict(assumptions_kb) + + return assumptions_kb, assumptions_orig, assumptions0 + + @staticmethod + def __xnew__(cls, name, **assumptions): # never cached (e.g. dummy) + if not isinstance(name, str): + raise TypeError("name should be a string, not %s" % repr(type(name))) + + + obj = Expr.__new__(cls) + obj.name = name + + assumptions_kb, assumptions_orig, assumptions0 = Symbol._canonical_assumptions(**assumptions) + + obj._assumptions = assumptions_kb + obj._assumptions_orig = assumptions_orig + obj._assumptions0 = tuple(sorted(assumptions0.items())) + + # The three assumptions dicts are all a little different: + # + # >>> from sympy import Symbol + # >>> x = Symbol('x', finite=True) + # >>> x.is_positive # query an assumption + # >>> x._assumptions + # {'finite': True, 'infinite': False, 'commutative': True, 'positive': None} + # >>> x._assumptions0 + # {'finite': True, 'infinite': False, 'commutative': True} + # >>> x._assumptions_orig + # {'finite': True} + # + # Two symbols with the same name are equal if their _assumptions0 are + # the same. Arguably it should be _assumptions_orig that is being + # compared because that is more transparent to the user (it is + # what was passed to the constructor modulo changes made by _sanitize). + + return obj + + @staticmethod + @cacheit + def __xnew_cached_(cls, name, **assumptions): # symbols are always cached + return Symbol.__xnew__(cls, name, **assumptions) + + def __getnewargs_ex__(self): + return ((self.name,), self._assumptions_orig) + + # NOTE: __setstate__ is not needed for pickles created by __getnewargs_ex__ + # but was used before Symbol was changed to use __getnewargs_ex__ in v1.9. + # Pickles created in previous SymPy versions will still need __setstate__ + # so that they can be unpickled in SymPy > v1.9. + + def __setstate__(self, state): + for name, value in state.items(): + setattr(self, name, value) + + def _hashable_content(self): + return (self.name,) + self._assumptions0 + + def _eval_subs(self, old, new): + if old.is_Pow: + from sympy.core.power import Pow + return Pow(self, S.One, evaluate=False)._eval_subs(old, new) + + def _eval_refine(self, assumptions): + return self + + @property + def assumptions0(self): + return dict(self._assumptions0) + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (1, (self.name,)), S.One.sort_key(), S.One + + def as_dummy(self): + # only put commutativity in explicitly if it is False + return Dummy(self.name) if self.is_commutative is not False \ + else Dummy(self.name, commutative=self.is_commutative) + + def as_real_imag(self, deep=True, **hints): + if hints.get('ignore') == self: + return None + else: + from sympy.functions.elementary.complexes import im, re + return (re(self), im(self)) + + def is_constant(self, *wrt, **flags): + if not wrt: + return False + return self not in wrt + + @property + def free_symbols(self): + return {self} + + binary_symbols = free_symbols # in this case, not always + + def as_set(self): + return S.UniversalSet + + +class Dummy(Symbol): + """Dummy symbols are each unique, even if they have the same name: + + Examples + ======== + + >>> from sympy import Dummy + >>> Dummy("x") == Dummy("x") + False + + If a name is not supplied then a string value of an internal count will be + used. This is useful when a temporary variable is needed and the name + of the variable used in the expression is not important. + + >>> Dummy() #doctest: +SKIP + _Dummy_10 + + """ + + # In the rare event that a Dummy object needs to be recreated, both the + # `name` and `dummy_index` should be passed. This is used by `srepr` for + # example: + # >>> d1 = Dummy() + # >>> d2 = eval(srepr(d1)) + # >>> d2 == d1 + # True + # + # If a new session is started between `srepr` and `eval`, there is a very + # small chance that `d2` will be equal to a previously-created Dummy. + + _count = 0 + _prng = random.Random() + _base_dummy_index = _prng.randint(10**6, 9*10**6) + + __slots__ = ('dummy_index',) + + is_Dummy = True + + def __new__(cls, name=None, dummy_index=None, **assumptions): + if dummy_index is not None: + assert name is not None, "If you specify a dummy_index, you must also provide a name" + + if name is None: + name = "Dummy_" + str(Dummy._count) + + if dummy_index is None: + dummy_index = Dummy._base_dummy_index + Dummy._count + Dummy._count += 1 + + cls._sanitize(assumptions, cls) + obj = Symbol.__xnew__(cls, name, **assumptions) + + obj.dummy_index = dummy_index + + return obj + + def __getnewargs_ex__(self): + return ((self.name, self.dummy_index), self._assumptions_orig) + + @cacheit + def sort_key(self, order=None): + return self.class_key(), ( + 2, (self.name, self.dummy_index)), S.One.sort_key(), S.One + + def _hashable_content(self): + return Symbol._hashable_content(self) + (self.dummy_index,) + + +class Wild(Symbol): + """ + A Wild symbol matches anything, or anything + without whatever is explicitly excluded. + + Parameters + ========== + + name : str + Name of the Wild instance. + + exclude : iterable, optional + Instances in ``exclude`` will not be matched. + + properties : iterable of functions, optional + Functions, each taking an expressions as input + and returns a ``bool``. All functions in ``properties`` + need to return ``True`` in order for the Wild instance + to match the expression. + + Examples + ======== + + >>> from sympy import Wild, WildFunction, cos, pi + >>> from sympy.abc import x, y, z + >>> a = Wild('a') + >>> x.match(a) + {a_: x} + >>> pi.match(a) + {a_: pi} + >>> (3*x**2).match(a*x) + {a_: 3*x} + >>> cos(x).match(a) + {a_: cos(x)} + >>> b = Wild('b', exclude=[x]) + >>> (3*x**2).match(b*x) + >>> b.match(a) + {a_: b_} + >>> A = WildFunction('A') + >>> A.match(a) + {a_: A_} + + Tips + ==== + + When using Wild, be sure to use the exclude + keyword to make the pattern more precise. + Without the exclude pattern, you may get matches + that are technically correct, but not what you + wanted. For example, using the above without + exclude: + + >>> from sympy import symbols + >>> a, b = symbols('a b', cls=Wild) + >>> (2 + 3*y).match(a*x + b*y) + {a_: 2/x, b_: 3} + + This is technically correct, because + (2/x)*x + 3*y == 2 + 3*y, but you probably + wanted it to not match at all. The issue is that + you really did not want a and b to include x and y, + and the exclude parameter lets you specify exactly + this. With the exclude parameter, the pattern will + not match. + + >>> a = Wild('a', exclude=[x, y]) + >>> b = Wild('b', exclude=[x, y]) + >>> (2 + 3*y).match(a*x + b*y) + + Exclude also helps remove ambiguity from matches. + + >>> E = 2*x**3*y*z + >>> a, b = symbols('a b', cls=Wild) + >>> E.match(a*b) + {a_: 2*y*z, b_: x**3} + >>> a = Wild('a', exclude=[x, y]) + >>> E.match(a*b) + {a_: z, b_: 2*x**3*y} + >>> a = Wild('a', exclude=[x, y, z]) + >>> E.match(a*b) + {a_: 2, b_: x**3*y*z} + + Wild also accepts a ``properties`` parameter: + + >>> a = Wild('a', properties=[lambda k: k.is_Integer]) + >>> E.match(a*b) + {a_: 2, b_: x**3*y*z} + + """ + is_Wild = True + + __slots__ = ('exclude', 'properties') + + def __new__(cls, name, exclude=(), properties=(), **assumptions): + exclude = tuple([sympify(x) for x in exclude]) + properties = tuple(properties) + cls._sanitize(assumptions, cls) + return Wild.__xnew__(cls, name, exclude, properties, **assumptions) + + def __getnewargs__(self): + return (self.name, self.exclude, self.properties) + + @staticmethod + @cacheit + def __xnew__(cls, name, exclude, properties, **assumptions): + obj = Symbol.__xnew__(cls, name, **assumptions) + obj.exclude = exclude + obj.properties = properties + return obj + + def _hashable_content(self): + return super()._hashable_content() + (self.exclude, self.properties) + + # TODO add check against another Wild + def matches(self, expr, repl_dict=None, old=False): + if any(expr.has(x) for x in self.exclude): + return None + if not all(f(expr) for f in self.properties): + return None + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + repl_dict[self] = expr + return repl_dict + + +_range = _re.compile('([0-9]*:[0-9]+|[a-zA-Z]?:[a-zA-Z])') + + +def symbols(names, *, cls=Symbol, **args) -> Any: + r""" + Transform strings into instances of :class:`Symbol` class. + + :func:`symbols` function returns a sequence of symbols with names taken + from ``names`` argument, which can be a comma or whitespace delimited + string, or a sequence of strings:: + + >>> from sympy import symbols, Function + + >>> x, y, z = symbols('x,y,z') + >>> a, b, c = symbols('a b c') + + The type of output is dependent on the properties of input arguments:: + + >>> symbols('x') + x + >>> symbols('x,') + (x,) + >>> symbols('x,y') + (x, y) + >>> symbols(('a', 'b', 'c')) + (a, b, c) + >>> symbols(['a', 'b', 'c']) + [a, b, c] + >>> symbols({'a', 'b', 'c'}) + {a, b, c} + + If an iterable container is needed for a single symbol, set the ``seq`` + argument to ``True`` or terminate the symbol name with a comma:: + + >>> symbols('x', seq=True) + (x,) + + To reduce typing, range syntax is supported to create indexed symbols. + Ranges are indicated by a colon and the type of range is determined by + the character to the right of the colon. If the character is a digit + then all contiguous digits to the left are taken as the nonnegative + starting value (or 0 if there is no digit left of the colon) and all + contiguous digits to the right are taken as 1 greater than the ending + value:: + + >>> symbols('x:10') + (x0, x1, x2, x3, x4, x5, x6, x7, x8, x9) + + >>> symbols('x5:10') + (x5, x6, x7, x8, x9) + >>> symbols('x5(:2)') + (x50, x51) + + >>> symbols('x5:10,y:5') + (x5, x6, x7, x8, x9, y0, y1, y2, y3, y4) + + >>> symbols(('x5:10', 'y:5')) + ((x5, x6, x7, x8, x9), (y0, y1, y2, y3, y4)) + + If the character to the right of the colon is a letter, then the single + letter to the left (or 'a' if there is none) is taken as the start + and all characters in the lexicographic range *through* the letter to + the right are used as the range:: + + >>> symbols('x:z') + (x, y, z) + >>> symbols('x:c') # null range + () + >>> symbols('x(:c)') + (xa, xb, xc) + + >>> symbols(':c') + (a, b, c) + + >>> symbols('a:d, x:z') + (a, b, c, d, x, y, z) + + >>> symbols(('a:d', 'x:z')) + ((a, b, c, d), (x, y, z)) + + Multiple ranges are supported; contiguous numerical ranges should be + separated by parentheses to disambiguate the ending number of one + range from the starting number of the next:: + + >>> symbols('x:2(1:3)') + (x01, x02, x11, x12) + >>> symbols(':3:2') # parsing is from left to right + (00, 01, 10, 11, 20, 21) + + Only one pair of parentheses surrounding ranges are removed, so to + include parentheses around ranges, double them. And to include spaces, + commas, or colons, escape them with a backslash:: + + >>> symbols('x((a:b))') + (x(a), x(b)) + >>> symbols(r'x(:1\,:2)') # or r'x((:1)\,(:2))' + (x(0,0), x(0,1)) + + All newly created symbols have assumptions set according to ``args``:: + + >>> a = symbols('a', integer=True) + >>> a.is_integer + True + + >>> x, y, z = symbols('x,y,z', real=True) + >>> x.is_real and y.is_real and z.is_real + True + + Despite its name, :func:`symbols` can create symbol-like objects like + instances of Function or Wild classes. To achieve this, set ``cls`` + keyword argument to the desired type:: + + >>> symbols('f,g,h', cls=Function) + (f, g, h) + + >>> type(_[0]) + + + """ + result = [] + + if isinstance(names, str): + marker = 0 + splitters = r'\,', r'\:', r'\ ' + literals: list[tuple[str, str]] = [] + for splitter in splitters: + if splitter in names: + while chr(marker) in names: + marker += 1 + lit_char = chr(marker) + marker += 1 + names = names.replace(splitter, lit_char) + literals.append((lit_char, splitter[1:])) + def literal(s): + if literals: + for c, l in literals: + s = s.replace(c, l) + return s + + names = names.strip() + as_seq = names.endswith(',') + if as_seq: + names = names[:-1].rstrip() + if not names: + raise ValueError('no symbols given') + + # split on commas + names = [n.strip() for n in names.split(',')] + if not all(n for n in names): + raise ValueError('missing symbol between commas') + # split on spaces + for i in range(len(names) - 1, -1, -1): + names[i: i + 1] = names[i].split() + + seq = args.pop('seq', as_seq) + + for name in names: + if not name: + raise ValueError('missing symbol') + + if ':' not in name: + symbol = cls(literal(name), **args) + result.append(symbol) + continue + + split: list[str] = _range.split(name) + split_list: list[list[str]] = [] + # remove 1 layer of bounding parentheses around ranges + for i in range(len(split) - 1): + if i and ':' in split[i] and split[i] != ':' and \ + split[i - 1].endswith('(') and \ + split[i + 1].startswith(')'): + split[i - 1] = split[i - 1][:-1] + split[i + 1] = split[i + 1][1:] + for s in split: + if ':' in s: + if s.endswith(':'): + raise ValueError('missing end range') + a, b = s.split(':') + if b[-1] in string.digits: + a_i = 0 if not a else int(a) + b_i = int(b) + split_list.append([str(c) for c in range(a_i, b_i)]) + else: + a = a or 'a' + split_list.append([string.ascii_letters[c] for c in range( + string.ascii_letters.index(a), + string.ascii_letters.index(b) + 1)]) # inclusive + if not split_list[-1]: + break + else: + split_list.append([s]) + else: + seq = True + if len(split_list) == 1: + names = split_list[0] + else: + names = [''.join(s) for s in product(*split_list)] + if literals: + result.extend([cls(literal(s), **args) for s in names]) + else: + result.extend([cls(s, **args) for s in names]) + + if not seq and len(result) <= 1: + if not result: + return () + return result[0] + + return tuple(result) + else: + for name in names: + result.append(symbols(name, cls=cls, **args)) + + return type(names)(result) + + +def var(names, **args): + """ + Create symbols and inject them into the global namespace. + + Explanation + =========== + + This calls :func:`symbols` with the same arguments and puts the results + into the *global* namespace. It's recommended not to use :func:`var` in + library code, where :func:`symbols` has to be used:: + + Examples + ======== + + >>> from sympy import var + + >>> var('x') + x + >>> x # noqa: F821 + x + + >>> var('a,ab,abc') + (a, ab, abc) + >>> abc # noqa: F821 + abc + + >>> var('x,y', real=True) + (x, y) + >>> x.is_real and y.is_real # noqa: F821 + True + + See :func:`symbols` documentation for more details on what kinds of + arguments can be passed to :func:`var`. + + """ + def traverse(symbols, frame): + """Recursively inject symbols to the global namespace. """ + for symbol in symbols: + if isinstance(symbol, Basic): + frame.f_globals[symbol.name] = symbol + elif isinstance(symbol, FunctionClass): + frame.f_globals[symbol.__name__] = symbol + else: + traverse(symbol, frame) + + from inspect import currentframe + frame = currentframe().f_back + + try: + syms = symbols(names, **args) + + if syms is not None: + if isinstance(syms, Basic): + frame.f_globals[syms.name] = syms + elif isinstance(syms, FunctionClass): + frame.f_globals[syms.__name__] = syms + else: + traverse(syms, frame) + finally: + del frame # break cyclic dependencies as stated in inspect docs + + return syms + +def disambiguate(*iter): + """ + Return a Tuple containing the passed expressions with symbols + that appear the same when printed replaced with numerically + subscripted symbols, and all Dummy symbols replaced with Symbols. + + Parameters + ========== + + iter: list of symbols or expressions. + + Examples + ======== + + >>> from sympy.core.symbol import disambiguate + >>> from sympy import Dummy, Symbol, Tuple + >>> from sympy.abc import y + + >>> tup = Symbol('_x'), Dummy('x'), Dummy('x') + >>> disambiguate(*tup) + (x_2, x, x_1) + + >>> eqs = Tuple(Symbol('x')/y, Dummy('x')/y) + >>> disambiguate(*eqs) + (x_1/y, x/y) + + >>> ix = Symbol('x', integer=True) + >>> vx = Symbol('x') + >>> disambiguate(vx + ix) + (x + x_1,) + + To make your own mapping of symbols to use, pass only the free symbols + of the expressions and create a dictionary: + + >>> free = eqs.free_symbols + >>> mapping = dict(zip(free, disambiguate(*free))) + >>> eqs.xreplace(mapping) + (x_1/y, x/y) + + """ + new_iter = Tuple(*iter) + key = lambda x:tuple(sorted(x.assumptions0.items())) + syms = ordered(new_iter.free_symbols, keys=key) + mapping = {} + for s in syms: + mapping.setdefault(str(s).lstrip('_'), []).append(s) + reps = {} + for k in mapping: + # the first or only symbol doesn't get subscripted but make + # sure that it's a Symbol, not a Dummy + mapk0 = Symbol("%s" % (k), **mapping[k][0].assumptions0) + if mapping[k][0] != mapk0: + reps[mapping[k][0]] = mapk0 + # the others get subscripts (and are made into Symbols) + skip = 0 + for i in range(1, len(mapping[k])): + while True: + name = "%s_%i" % (k, i + skip) + if name not in mapping: + break + skip += 1 + ki = mapping[k][i] + reps[ki] = Symbol(name, **ki.assumptions0) + return new_iter.xreplace(reps) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sympify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..df30fbb85d5f160540312de4eef1d0e6702fc974 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/sympify.py @@ -0,0 +1,646 @@ +"""sympify -- convert objects SymPy internal format""" + +from __future__ import annotations + +from typing import Any, Callable, overload, TYPE_CHECKING, TypeVar + +import mpmath.libmp as mlib + +from inspect import getmro +import string +from sympy.core.random import choice + +from .parameters import global_parameters + +from sympy.utilities.iterables import iterable + + +if TYPE_CHECKING: + + from sympy.core.basic import Basic + from sympy.core.expr import Expr + from sympy.core.numbers import Integer, Float + + Tbasic = TypeVar('Tbasic', bound=Basic) + + +class SympifyError(ValueError): + def __init__(self, expr, base_exc=None): + self.expr = expr + self.base_exc = base_exc + + def __str__(self): + if self.base_exc is None: + return "SympifyError: %r" % (self.expr,) + + return ("Sympify of expression '%s' failed, because of exception being " + "raised:\n%s: %s" % (self.expr, self.base_exc.__class__.__name__, + str(self.base_exc))) + + +converter: dict[type[Any], Callable[[Any], Basic]] = {} + +#holds the conversions defined in SymPy itself, i.e. non-user defined conversions +_sympy_converter: dict[type[Any], Callable[[Any], Basic]] = {} + +#alias for clearer use in the library +_external_converter = converter + +class CantSympify: + """ + Mix in this trait to a class to disallow sympification of its instances. + + Examples + ======== + + >>> from sympy import sympify + >>> from sympy.core.sympify import CantSympify + + >>> class Something(dict): + ... pass + ... + >>> sympify(Something()) + {} + + >>> class Something(dict, CantSympify): + ... pass + ... + >>> sympify(Something()) + Traceback (most recent call last): + ... + SympifyError: SympifyError: {} + + """ + + __slots__ = () + + +def _is_numpy_instance(a): + """ + Checks if an object is an instance of a type from the numpy module. + """ + # This check avoids unnecessarily importing NumPy. We check the whole + # __mro__ in case any base type is a numpy type. + return any(type_.__module__ == 'numpy' + for type_ in type(a).__mro__) + + +def _convert_numpy_types(a, **sympify_args): + """ + Converts a numpy datatype input to an appropriate SymPy type. + """ + import numpy as np + if not isinstance(a, np.floating): + if np.iscomplex(a): + return _sympy_converter[complex](a.item()) + else: + return sympify(a.item(), **sympify_args) + else: + from .numbers import Float + prec = np.finfo(a).nmant + 1 + # E.g. double precision means prec=53 but nmant=52 + # Leading bit of mantissa is always 1, so is not stored + if np.isposinf(a): + return Float('inf') + elif np.isneginf(a): + return Float('-inf') + else: + p, q = a.as_integer_ratio() + a = mlib.from_rational(p, q, prec) + return Float(a, precision=prec) + + +@overload +def sympify(a: int, *, strict: bool = False) -> Integer: ... # type: ignore +@overload +def sympify(a: float, *, strict: bool = False) -> Float: ... +@overload +def sympify(a: Expr | complex, *, strict: bool = False) -> Expr: ... +@overload +def sympify(a: Tbasic, *, strict: bool = False) -> Tbasic: ... +@overload +def sympify(a: Any, *, strict: bool = False) -> Basic: ... + +def sympify(a, locals=None, convert_xor=True, strict=False, rational=False, + evaluate=None): + """ + Converts an arbitrary expression to a type that can be used inside SymPy. + + Explanation + =========== + + It will convert Python ints into instances of :class:`~.Integer`, floats + into instances of :class:`~.Float`, etc. It is also able to coerce + symbolic expressions which inherit from :class:`~.Basic`. This can be + useful in cooperation with SAGE. + + .. warning:: + Note that this function uses ``eval``, and thus shouldn't be used on + unsanitized input. + + If the argument is already a type that SymPy understands, it will do + nothing but return that value. This can be used at the beginning of a + function to ensure you are working with the correct type. + + Examples + ======== + + >>> from sympy import sympify + + >>> sympify(2).is_integer + True + >>> sympify(2).is_real + True + + >>> sympify(2.0).is_real + True + >>> sympify("2.0").is_real + True + >>> sympify("2e-45").is_real + True + + If the expression could not be converted, a SympifyError is raised. + + >>> sympify("x***2") + Traceback (most recent call last): + ... + SympifyError: SympifyError: "could not parse 'x***2'" + + When attempting to parse non-Python syntax using ``sympify``, it raises a + ``SympifyError``: + + >>> sympify("2x+1") + Traceback (most recent call last): + ... + SympifyError: Sympify of expression 'could not parse '2x+1'' failed + + To parse non-Python syntax, use ``parse_expr`` from ``sympy.parsing.sympy_parser``. + + >>> from sympy.parsing.sympy_parser import parse_expr + >>> parse_expr("2x+1", transformations="all") + 2*x + 1 + + For more details about ``transformations``: see :func:`~sympy.parsing.sympy_parser.parse_expr` + + Locals + ------ + + The sympification happens with access to everything that is loaded + by ``from sympy import *``; anything used in a string that is not + defined by that import will be converted to a symbol. In the following, + the ``bitcount`` function is treated as a symbol and the ``O`` is + interpreted as the :class:`~.Order` object (used with series) and it raises + an error when used improperly: + + >>> s = 'bitcount(42)' + >>> sympify(s) + bitcount(42) + >>> sympify("O(x)") + O(x) + >>> sympify("O + 1") + Traceback (most recent call last): + ... + TypeError: unbound method... + + In order to have ``bitcount`` be recognized it can be imported into a + namespace dictionary and passed as locals: + + >>> ns = {} + >>> exec('from sympy.core.evalf import bitcount', ns) + >>> sympify(s, locals=ns) + 6 + + In order to have the ``O`` interpreted as a Symbol, identify it as such + in the namespace dictionary. This can be done in a variety of ways; all + three of the following are possibilities: + + >>> from sympy import Symbol + >>> ns["O"] = Symbol("O") # method 1 + >>> exec('from sympy.abc import O', ns) # method 2 + >>> ns.update(dict(O=Symbol("O"))) # method 3 + >>> sympify("O + 1", locals=ns) + O + 1 + + If you want *all* single-letter and Greek-letter variables to be symbols + then you can use the clashing-symbols dictionaries that have been defined + there as private variables: ``_clash1`` (single-letter variables), + ``_clash2`` (the multi-letter Greek names) or ``_clash`` (both single and + multi-letter names that are defined in ``abc``). + + >>> from sympy.abc import _clash1 + >>> set(_clash1) # if this fails, see issue #23903 + {'E', 'I', 'N', 'O', 'Q', 'S'} + >>> sympify('I & Q', _clash1) + I & Q + + Strict + ------ + + If the option ``strict`` is set to ``True``, only the types for which an + explicit conversion has been defined are converted. In the other + cases, a SympifyError is raised. + + >>> print(sympify(None)) + None + >>> sympify(None, strict=True) + Traceback (most recent call last): + ... + SympifyError: SympifyError: None + + .. deprecated:: 1.6 + + ``sympify(obj)`` automatically falls back to ``str(obj)`` when all + other conversion methods fail, but this is deprecated. ``strict=True`` + will disable this deprecated behavior. See + :ref:`deprecated-sympify-string-fallback`. + + Evaluation + ---------- + + If the option ``evaluate`` is set to ``False``, then arithmetic and + operators will be converted into their SymPy equivalents and the + ``evaluate=False`` option will be added. Nested ``Add`` or ``Mul`` will + be denested first. This is done via an AST transformation that replaces + operators with their SymPy equivalents, so if an operand redefines any + of those operations, the redefined operators will not be used. If + argument a is not a string, the mathematical expression is evaluated + before being passed to sympify, so adding ``evaluate=False`` will still + return the evaluated result of expression. + + >>> sympify('2**2 / 3 + 5') + 19/3 + >>> sympify('2**2 / 3 + 5', evaluate=False) + 2**2/3 + 5 + >>> sympify('4/2+7', evaluate=True) + 9 + >>> sympify('4/2+7', evaluate=False) + 4/2 + 7 + >>> sympify(4/2+7, evaluate=False) + 9.00000000000000 + + Extending + --------- + + To extend ``sympify`` to convert custom objects (not derived from ``Basic``), + just define a ``_sympy_`` method to your class. You can do that even to + classes that you do not own by subclassing or adding the method at runtime. + + >>> from sympy import Matrix + >>> class MyList1(object): + ... def __iter__(self): + ... yield 1 + ... yield 2 + ... return + ... def __getitem__(self, i): return list(self)[i] + ... def _sympy_(self): return Matrix(self) + >>> sympify(MyList1()) + Matrix([ + [1], + [2]]) + + If you do not have control over the class definition you could also use the + ``converter`` global dictionary. The key is the class and the value is a + function that takes a single argument and returns the desired SymPy + object, e.g. ``converter[MyList] = lambda x: Matrix(x)``. + + >>> class MyList2(object): # XXX Do not do this if you control the class! + ... def __iter__(self): # Use _sympy_! + ... yield 1 + ... yield 2 + ... return + ... def __getitem__(self, i): return list(self)[i] + >>> from sympy.core.sympify import converter + >>> converter[MyList2] = lambda x: Matrix(x) + >>> sympify(MyList2()) + Matrix([ + [1], + [2]]) + + Notes + ===== + + The keywords ``rational`` and ``convert_xor`` are only used + when the input is a string. + + convert_xor + ----------- + + >>> sympify('x^y',convert_xor=True) + x**y + >>> sympify('x^y',convert_xor=False) + x ^ y + + rational + -------- + + >>> sympify('0.1',rational=False) + 0.1 + >>> sympify('0.1',rational=True) + 1/10 + + Sometimes autosimplification during sympification results in expressions + that are very different in structure than what was entered. Until such + autosimplification is no longer done, the ``kernS`` function might be of + some use. In the example below you can see how an expression reduces to + $-1$ by autosimplification, but does not do so when ``kernS`` is used. + + >>> from sympy.core.sympify import kernS + >>> from sympy.abc import x + >>> -2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1 + -1 + >>> s = '-2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1' + >>> sympify(s) + -1 + >>> kernS(s) + -2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1 + + Parameters + ========== + + a : + - any object defined in SymPy + - standard numeric Python types: ``int``, ``long``, ``float``, ``Decimal`` + - strings (like ``"0.09"``, ``"2e-19"`` or ``'sin(x)'``) + - booleans, including ``None`` (will leave ``None`` unchanged) + - dicts, lists, sets or tuples containing any of the above + + convert_xor : bool, optional + If true, treats ``^`` as exponentiation. + If False, treats ``^`` as XOR itself. + Used only when input is a string. + + locals : any object defined in SymPy, optional + In order to have strings be recognized it can be imported + into a namespace dictionary and passed as locals. + + strict : bool, optional + If the option strict is set to ``True``, only the types for which + an explicit conversion has been defined are converted. In the + other cases, a SympifyError is raised. + + rational : bool, optional + If ``True``, converts floats into :class:`~.Rational`. + If ``False``, it lets floats remain as it is. + Used only when input is a string. + + evaluate : bool, optional + If False, then arithmetic and operators will be converted into + their SymPy equivalents. If True the expression will be evaluated + and the result will be returned. + + """ + # XXX: If a is a Basic subclass rather than instance (e.g. sin rather than + # sin(x)) then a.__sympy__ will be the property. Only on the instance will + # a.__sympy__ give the *value* of the property (True). Since sympify(sin) + # was used for a long time we allow it to pass. However if strict=True as + # is the case in internal calls to _sympify then we only allow + # is_sympy=True. + # + # https://github.com/sympy/sympy/issues/20124 + is_sympy = getattr(a, '__sympy__', None) + if is_sympy is True: + return a + elif is_sympy is not None: + if not strict: + return a + else: + raise SympifyError(a) + + if isinstance(a, CantSympify): + raise SympifyError(a) + + cls = getattr(a, "__class__", None) + + #Check if there exists a converter for any of the types in the mro + for superclass in getmro(cls): + #First check for user defined converters + conv = _external_converter.get(superclass) + if conv is None: + #if none exists, check for SymPy defined converters + conv = _sympy_converter.get(superclass) + if conv is not None: + return conv(a) + + if cls is type(None): + if strict: + raise SympifyError(a) + else: + return a + + if evaluate is None: + evaluate = global_parameters.evaluate + + # Support for basic numpy datatypes + if _is_numpy_instance(a): + import numpy as np + if np.isscalar(a): + return _convert_numpy_types(a, locals=locals, + convert_xor=convert_xor, strict=strict, rational=rational, + evaluate=evaluate) + + _sympy_ = getattr(a, "_sympy_", None) + if _sympy_ is not None: + return a._sympy_() + + if not strict: + # Put numpy array conversion _before_ float/int, see + # . + flat = getattr(a, "flat", None) + if flat is not None: + shape = getattr(a, "shape", None) + if shape is not None: + from sympy.tensor.array import Array + return Array(a.flat, a.shape) # works with e.g. NumPy arrays + + if not isinstance(a, str): + if _is_numpy_instance(a): + import numpy as np + assert not isinstance(a, np.number) + if isinstance(a, np.ndarray): + # Scalar arrays (those with zero dimensions) have sympify + # called on the scalar element. + if a.ndim == 0: + try: + return sympify(a.item(), + locals=locals, + convert_xor=convert_xor, + strict=strict, + rational=rational, + evaluate=evaluate) + except SympifyError: + pass + elif hasattr(a, '__float__'): + # float and int can coerce size-one numpy arrays to their lone + # element. See issue https://github.com/numpy/numpy/issues/10404. + return sympify(float(a)) + elif hasattr(a, '__int__'): + return sympify(int(a)) + + if strict: + raise SympifyError(a) + + if iterable(a): + try: + return type(a)([sympify(x, locals=locals, convert_xor=convert_xor, + rational=rational, evaluate=evaluate) for x in a]) + except TypeError: + # Not all iterables are rebuildable with their type. + pass + + if not isinstance(a, str): + raise SympifyError('cannot sympify object of type %r' % type(a)) + + from sympy.parsing.sympy_parser import (parse_expr, TokenError, + standard_transformations) + from sympy.parsing.sympy_parser import convert_xor as t_convert_xor + from sympy.parsing.sympy_parser import rationalize as t_rationalize + + transformations = standard_transformations + + if rational: + transformations += (t_rationalize,) + if convert_xor: + transformations += (t_convert_xor,) + + try: + a = a.replace('\n', '') + expr = parse_expr(a, local_dict=locals, transformations=transformations, evaluate=evaluate) + except (TokenError, SyntaxError) as exc: + raise SympifyError('could not parse %r' % a, exc) + + return expr + + +def _sympify(a): + """ + Short version of :func:`~.sympify` for internal usage for ``__add__`` and + ``__eq__`` methods where it is ok to allow some things (like Python + integers and floats) in the expression. This excludes things (like strings) + that are unwise to allow into such an expression. + + >>> from sympy import Integer + >>> Integer(1) == 1 + True + + >>> Integer(1) == '1' + False + + >>> from sympy.abc import x + >>> x + 1 + x + 1 + + >>> x + '1' + Traceback (most recent call last): + ... + TypeError: unsupported operand type(s) for +: 'Symbol' and 'str' + + see: sympify + + """ + return sympify(a, strict=True) + + +def kernS(s): + """Use a hack to try keep autosimplification from distributing a + a number into an Add; this modification does not + prevent the 2-arg Mul from becoming an Add, however. + + Examples + ======== + + >>> from sympy.core.sympify import kernS + >>> from sympy.abc import x, y + + The 2-arg Mul distributes a number (or minus sign) across the terms + of an expression, but kernS will prevent that: + + >>> 2*(x + y), -(x + 1) + (2*x + 2*y, -x - 1) + >>> kernS('2*(x + y)') + 2*(x + y) + >>> kernS('-(x + 1)') + -(x + 1) + + If use of the hack fails, the un-hacked string will be passed to sympify... + and you get what you get. + + XXX This hack should not be necessary once issue 4596 has been resolved. + """ + hit = False + quoted = '"' in s or "'" in s + if '(' in s and not quoted: + if s.count('(') != s.count(")"): + raise SympifyError('unmatched left parenthesis') + + # strip all space from s + s = ''.join(s.split()) + olds = s + # now use space to represent a symbol that + # will + # step 1. turn potential 2-arg Muls into 3-arg versions + # 1a. *( -> * *( + s = s.replace('*(', '* *(') + # 1b. close up exponentials + s = s.replace('** *', '**') + # 2. handle the implied multiplication of a negated + # parenthesized expression in two steps + # 2a: -(...) --> -( *(...) + target = '-( *(' + s = s.replace('-(', target) + # 2b: double the matching closing parenthesis + # -( *(...) --> -( *(...)) + i = nest = 0 + assert target.endswith('(') # assumption below + while True: + j = s.find(target, i) + if j == -1: + break + j += len(target) - 1 + for j in range(j, len(s)): + if s[j] == "(": + nest += 1 + elif s[j] == ")": + nest -= 1 + if nest == 0: + break + s = s[:j] + ")" + s[j:] + i = j + 2 # the first char after 2nd ) + if ' ' in s: + # get a unique kern + kern = '_' + while kern in s: + kern += choice(string.ascii_letters + string.digits) + s = s.replace(' ', kern) + hit = kern in s + else: + hit = False + + for i in range(2): + try: + expr = sympify(s) + break + except TypeError: # the kern might cause unknown errors... + if hit: + s = olds # maybe it didn't like the kern; use un-kerned s + hit = False + continue + expr = sympify(s) # let original error raise + + if not hit: + return expr + + from .symbol import Symbol + rep = {Symbol(kern): 1} + def _clear(expr): + if isinstance(expr, (list, tuple, set)): + return type(expr)([_clear(e) for e in expr]) + if hasattr(expr, 'subs'): + return expr.subs(rep, hack2=True) + return expr + expr = _clear(expr) + # hope that kern is not there anymore + return expr + + +# Avoid circular import +from .basic import Basic diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_args.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_args.py new file mode 100644 index 0000000000000000000000000000000000000000..75b326146e1cc645a27e26ba13d44c92d56d5efb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_args.py @@ -0,0 +1,5517 @@ +"""Test whether all elements of cls.args are instances of Basic. """ + +# NOTE: keep tests sorted by (module, class name) key. If a class can't +# be instantiated, add it here anyway with @SKIP("abstract class) (see +# e.g. Function). + +import os +import re +from pathlib import Path + +from sympy.assumptions.ask import Q +from sympy.core.basic import Basic +from sympy.core.function import (Function, Lambda) +from sympy.core.numbers import (Rational, oo, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin + +from sympy.testing.pytest import SKIP, warns_deprecated_sympy + +a, b, c, x, y, z, s = symbols('a,b,c,x,y,z,s') + + +whitelist = [ + "sympy.assumptions.predicates", # tested by test_predicates() + "sympy.assumptions.relation.equality", # tested by test_predicates() +] + +def test_all_classes_are_tested(): + this = os.path.split(__file__)[0] + path = os.path.join(this, os.pardir, os.pardir) + sympy_path = os.path.abspath(path) + prefix = os.path.split(sympy_path)[0] + os.sep + + re_cls = re.compile(r"^class ([A-Za-z][A-Za-z0-9_]*)\s*\(", re.MULTILINE) + + modules = {} + + for root, dirs, files in os.walk(sympy_path): + module = root.replace(prefix, "").replace(os.sep, ".") + + for file in files: + if file.startswith(("_", "test_", "bench_")): + continue + if not file.endswith(".py"): + continue + + text = Path(os.path.join(root, file)).read_text(encoding='utf-8') + + submodule = module + '.' + file[:-3] + + if any(submodule.startswith(wpath) for wpath in whitelist): + continue + + names = re_cls.findall(text) + + if not names: + continue + + try: + mod = __import__(submodule, fromlist=names) + except ImportError: + continue + + def is_Basic(name): + cls = getattr(mod, name) + if hasattr(cls, '_sympy_deprecated_func'): + cls = cls._sympy_deprecated_func + if not isinstance(cls, type): + # check instance of singleton class with same name + cls = type(cls) + return issubclass(cls, Basic) + + names = list(filter(is_Basic, names)) + + if names: + modules[submodule] = names + + ns = globals() + failed = [] + + for module, names in modules.items(): + mod = module.replace('.', '__') + + for name in names: + test = 'test_' + mod + '__' + name + + if test not in ns: + failed.append(module + '.' + name) + + assert not failed, "Missing classes: %s. Please add tests for these to sympy/core/tests/test_args.py." % ", ".join(failed) + + +def _test_args(obj): + all_basic = all(isinstance(arg, Basic) for arg in obj.args) + # Ideally obj.func(*obj.args) would always recreate the object, but for + # now, we only require it for objects with non-empty .args + recreatable = not obj.args or obj.func(*obj.args) == obj + return all_basic and recreatable + + +def test_sympy__algebras__quaternion__Quaternion(): + from sympy.algebras.quaternion import Quaternion + assert _test_args(Quaternion(x, 1, 2, 3)) + + +def test_sympy__assumptions__assume__AppliedPredicate(): + from sympy.assumptions.assume import AppliedPredicate, Predicate + assert _test_args(AppliedPredicate(Predicate("test"), 2)) + assert _test_args(Q.is_true(True)) + +@SKIP("abstract class") +def test_sympy__assumptions__assume__Predicate(): + pass + +def test_predicates(): + predicates = [ + getattr(Q, attr) + for attr in Q.__class__.__dict__ + if not attr.startswith('__')] + for p in predicates: + assert _test_args(p) + +def test_sympy__assumptions__assume__UndefinedPredicate(): + from sympy.assumptions.assume import Predicate + assert _test_args(Predicate("test")) + +@SKIP('abstract class') +def test_sympy__assumptions__relation__binrel__BinaryRelation(): + pass + +def test_sympy__assumptions__relation__binrel__AppliedBinaryRelation(): + assert _test_args(Q.eq(1, 2)) + +def test_sympy__assumptions__wrapper__AssumptionsWrapper(): + from sympy.assumptions.wrapper import AssumptionsWrapper + assert _test_args(AssumptionsWrapper(x, Q.positive(x))) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__CodegenAST(): + from sympy.codegen.ast import CodegenAST + assert _test_args(CodegenAST()) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__AssignmentBase(): + from sympy.codegen.ast import AssignmentBase + assert _test_args(AssignmentBase(x, 1)) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__AugmentedAssignment(): + from sympy.codegen.ast import AugmentedAssignment + assert _test_args(AugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__AddAugmentedAssignment(): + from sympy.codegen.ast import AddAugmentedAssignment + assert _test_args(AddAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__SubAugmentedAssignment(): + from sympy.codegen.ast import SubAugmentedAssignment + assert _test_args(SubAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__MulAugmentedAssignment(): + from sympy.codegen.ast import MulAugmentedAssignment + assert _test_args(MulAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__DivAugmentedAssignment(): + from sympy.codegen.ast import DivAugmentedAssignment + assert _test_args(DivAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__ModAugmentedAssignment(): + from sympy.codegen.ast import ModAugmentedAssignment + assert _test_args(ModAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__CodeBlock(): + from sympy.codegen.ast import CodeBlock, Assignment + assert _test_args(CodeBlock(Assignment(x, 1), Assignment(y, 2))) + +def test_sympy__codegen__ast__For(): + from sympy.codegen.ast import For, CodeBlock, AddAugmentedAssignment + from sympy.sets import Range + assert _test_args(For(x, Range(10), CodeBlock(AddAugmentedAssignment(y, 1)))) + + +def test_sympy__codegen__ast__Token(): + from sympy.codegen.ast import Token + assert _test_args(Token()) + + +def test_sympy__codegen__ast__ContinueToken(): + from sympy.codegen.ast import ContinueToken + assert _test_args(ContinueToken()) + +def test_sympy__codegen__ast__BreakToken(): + from sympy.codegen.ast import BreakToken + assert _test_args(BreakToken()) + +def test_sympy__codegen__ast__NoneToken(): + from sympy.codegen.ast import NoneToken + assert _test_args(NoneToken()) + +def test_sympy__codegen__ast__String(): + from sympy.codegen.ast import String + assert _test_args(String('foobar')) + +def test_sympy__codegen__ast__QuotedString(): + from sympy.codegen.ast import QuotedString + assert _test_args(QuotedString('foobar')) + +def test_sympy__codegen__ast__Comment(): + from sympy.codegen.ast import Comment + assert _test_args(Comment('this is a comment')) + +def test_sympy__codegen__ast__Node(): + from sympy.codegen.ast import Node + assert _test_args(Node()) + assert _test_args(Node(attrs={1, 2, 3})) + + +def test_sympy__codegen__ast__Type(): + from sympy.codegen.ast import Type + assert _test_args(Type('float128')) + + +def test_sympy__codegen__ast__IntBaseType(): + from sympy.codegen.ast import IntBaseType + assert _test_args(IntBaseType('bigint')) + + +def test_sympy__codegen__ast___SizedIntType(): + from sympy.codegen.ast import _SizedIntType + assert _test_args(_SizedIntType('int128', 128)) + + +def test_sympy__codegen__ast__SignedIntType(): + from sympy.codegen.ast import SignedIntType + assert _test_args(SignedIntType('int128_with_sign', 128)) + + +def test_sympy__codegen__ast__UnsignedIntType(): + from sympy.codegen.ast import UnsignedIntType + assert _test_args(UnsignedIntType('unt128', 128)) + + +def test_sympy__codegen__ast__FloatBaseType(): + from sympy.codegen.ast import FloatBaseType + assert _test_args(FloatBaseType('positive_real')) + + +def test_sympy__codegen__ast__FloatType(): + from sympy.codegen.ast import FloatType + assert _test_args(FloatType('float242', 242, nmant=142, nexp=99)) + + +def test_sympy__codegen__ast__ComplexBaseType(): + from sympy.codegen.ast import ComplexBaseType + assert _test_args(ComplexBaseType('positive_cmplx')) + +def test_sympy__codegen__ast__ComplexType(): + from sympy.codegen.ast import ComplexType + assert _test_args(ComplexType('complex42', 42, nmant=15, nexp=5)) + + +def test_sympy__codegen__ast__Attribute(): + from sympy.codegen.ast import Attribute + assert _test_args(Attribute('noexcept')) + + +def test_sympy__codegen__ast__Variable(): + from sympy.codegen.ast import Variable, Type, value_const + assert _test_args(Variable(x)) + assert _test_args(Variable(y, Type('float32'), {value_const})) + assert _test_args(Variable(z, type=Type('float64'))) + + +def test_sympy__codegen__ast__Pointer(): + from sympy.codegen.ast import Pointer, Type, pointer_const + assert _test_args(Pointer(x)) + assert _test_args(Pointer(y, type=Type('float32'))) + assert _test_args(Pointer(z, Type('float64'), {pointer_const})) + + +def test_sympy__codegen__ast__Declaration(): + from sympy.codegen.ast import Declaration, Variable, Type + vx = Variable(x, type=Type('float')) + assert _test_args(Declaration(vx)) + + +def test_sympy__codegen__ast__While(): + from sympy.codegen.ast import While, AddAugmentedAssignment + assert _test_args(While(abs(x) < 1, [AddAugmentedAssignment(x, -1)])) + + +def test_sympy__codegen__ast__Scope(): + from sympy.codegen.ast import Scope, AddAugmentedAssignment + assert _test_args(Scope([AddAugmentedAssignment(x, -1)])) + + +def test_sympy__codegen__ast__Stream(): + from sympy.codegen.ast import Stream + assert _test_args(Stream('stdin')) + +def test_sympy__codegen__ast__Print(): + from sympy.codegen.ast import Print + assert _test_args(Print([x, y])) + assert _test_args(Print([x, y], "%d %d")) + + +def test_sympy__codegen__ast__FunctionPrototype(): + from sympy.codegen.ast import FunctionPrototype, real, Declaration, Variable + inp_x = Declaration(Variable(x, type=real)) + assert _test_args(FunctionPrototype(real, 'pwer', [inp_x])) + + +def test_sympy__codegen__ast__FunctionDefinition(): + from sympy.codegen.ast import FunctionDefinition, real, Declaration, Variable, Assignment + inp_x = Declaration(Variable(x, type=real)) + assert _test_args(FunctionDefinition(real, 'pwer', [inp_x], [Assignment(x, x**2)])) + + +def test_sympy__codegen__ast__Raise(): + from sympy.codegen.ast import Raise + assert _test_args(Raise(x)) + + +def test_sympy__codegen__ast__Return(): + from sympy.codegen.ast import Return + assert _test_args(Return(x)) + + +def test_sympy__codegen__ast__RuntimeError_(): + from sympy.codegen.ast import RuntimeError_ + assert _test_args(RuntimeError_('"message"')) + + +def test_sympy__codegen__ast__FunctionCall(): + from sympy.codegen.ast import FunctionCall + assert _test_args(FunctionCall('pwer', [x])) + + +def test_sympy__codegen__ast__Element(): + from sympy.codegen.ast import Element + assert _test_args(Element('x', range(3))) + + +def test_sympy__codegen__cnodes__CommaOperator(): + from sympy.codegen.cnodes import CommaOperator + assert _test_args(CommaOperator(1, 2)) + + +def test_sympy__codegen__cnodes__goto(): + from sympy.codegen.cnodes import goto + assert _test_args(goto('early_exit')) + + +def test_sympy__codegen__cnodes__Label(): + from sympy.codegen.cnodes import Label + assert _test_args(Label('early_exit')) + + +def test_sympy__codegen__cnodes__PreDecrement(): + from sympy.codegen.cnodes import PreDecrement + assert _test_args(PreDecrement(x)) + + +def test_sympy__codegen__cnodes__PostDecrement(): + from sympy.codegen.cnodes import PostDecrement + assert _test_args(PostDecrement(x)) + + +def test_sympy__codegen__cnodes__PreIncrement(): + from sympy.codegen.cnodes import PreIncrement + assert _test_args(PreIncrement(x)) + + +def test_sympy__codegen__cnodes__PostIncrement(): + from sympy.codegen.cnodes import PostIncrement + assert _test_args(PostIncrement(x)) + + +def test_sympy__codegen__cnodes__struct(): + from sympy.codegen.ast import real, Variable + from sympy.codegen.cnodes import struct + assert _test_args(struct(declarations=[ + Variable(x, type=real), + Variable(y, type=real) + ])) + + +def test_sympy__codegen__cnodes__union(): + from sympy.codegen.ast import float32, int32, Variable + from sympy.codegen.cnodes import union + assert _test_args(union(declarations=[ + Variable(x, type=float32), + Variable(y, type=int32) + ])) + + +def test_sympy__codegen__cxxnodes__using(): + from sympy.codegen.cxxnodes import using + assert _test_args(using('std::vector')) + assert _test_args(using('std::vector', 'vec')) + + +def test_sympy__codegen__fnodes__Program(): + from sympy.codegen.fnodes import Program + assert _test_args(Program('foobar', [])) + +def test_sympy__codegen__fnodes__Module(): + from sympy.codegen.fnodes import Module + assert _test_args(Module('foobar', [], [])) + + +def test_sympy__codegen__fnodes__Subroutine(): + from sympy.codegen.fnodes import Subroutine + x = symbols('x', real=True) + assert _test_args(Subroutine('foo', [x], [])) + + +def test_sympy__codegen__fnodes__GoTo(): + from sympy.codegen.fnodes import GoTo + assert _test_args(GoTo([10])) + assert _test_args(GoTo([10, 20], x > 1)) + + +def test_sympy__codegen__fnodes__FortranReturn(): + from sympy.codegen.fnodes import FortranReturn + assert _test_args(FortranReturn(10)) + + +def test_sympy__codegen__fnodes__Extent(): + from sympy.codegen.fnodes import Extent + assert _test_args(Extent()) + assert _test_args(Extent(None)) + assert _test_args(Extent(':')) + assert _test_args(Extent(-3, 4)) + assert _test_args(Extent(x, y)) + + +def test_sympy__codegen__fnodes__use_rename(): + from sympy.codegen.fnodes import use_rename + assert _test_args(use_rename('loc', 'glob')) + + +def test_sympy__codegen__fnodes__use(): + from sympy.codegen.fnodes import use + assert _test_args(use('modfoo', only='bar')) + + +def test_sympy__codegen__fnodes__SubroutineCall(): + from sympy.codegen.fnodes import SubroutineCall + assert _test_args(SubroutineCall('foo', ['bar', 'baz'])) + + +def test_sympy__codegen__fnodes__Do(): + from sympy.codegen.fnodes import Do + assert _test_args(Do([], 'i', 1, 42)) + + +def test_sympy__codegen__fnodes__ImpliedDoLoop(): + from sympy.codegen.fnodes import ImpliedDoLoop + assert _test_args(ImpliedDoLoop('i', 'i', 1, 42)) + + +def test_sympy__codegen__fnodes__ArrayConstructor(): + from sympy.codegen.fnodes import ArrayConstructor + assert _test_args(ArrayConstructor([1, 2, 3])) + from sympy.codegen.fnodes import ImpliedDoLoop + idl = ImpliedDoLoop('i', 'i', 1, 42) + assert _test_args(ArrayConstructor([1, idl, 3])) + + +def test_sympy__codegen__fnodes__sum_(): + from sympy.codegen.fnodes import sum_ + assert _test_args(sum_('arr')) + + +def test_sympy__codegen__fnodes__product_(): + from sympy.codegen.fnodes import product_ + assert _test_args(product_('arr')) + + +def test_sympy__codegen__numpy_nodes__logaddexp(): + from sympy.codegen.numpy_nodes import logaddexp + assert _test_args(logaddexp(x, y)) + + +def test_sympy__codegen__numpy_nodes__logaddexp2(): + from sympy.codegen.numpy_nodes import logaddexp2 + assert _test_args(logaddexp2(x, y)) + + +def test_sympy__codegen__numpy_nodes__amin(): + from sympy.codegen.numpy_nodes import amin + assert _test_args(amin(x)) + + +def test_sympy__codegen__numpy_nodes__amax(): + from sympy.codegen.numpy_nodes import amax + assert _test_args(amax(x)) + + +def test_sympy__codegen__numpy_nodes__minimum(): + from sympy.codegen.numpy_nodes import minimum + assert _test_args(minimum(x, y, z)) + + +def test_sympy__codegen__numpy_nodes__maximum(): + from sympy.codegen.numpy_nodes import maximum + assert _test_args(maximum(x, y, z)) + + +def test_sympy__codegen__pynodes__List(): + from sympy.codegen.pynodes import List + assert _test_args(List(1, 2, 3)) + + +def test_sympy__codegen__pynodes__NumExprEvaluate(): + from sympy.codegen.pynodes import NumExprEvaluate + assert _test_args(NumExprEvaluate(x)) + + +def test_sympy__codegen__scipy_nodes__cosm1(): + from sympy.codegen.scipy_nodes import cosm1 + assert _test_args(cosm1(x)) + + +def test_sympy__codegen__scipy_nodes__powm1(): + from sympy.codegen.scipy_nodes import powm1 + assert _test_args(powm1(x, y)) + + +def test_sympy__codegen__abstract_nodes__List(): + from sympy.codegen.abstract_nodes import List + assert _test_args(List(1, 2, 3)) + +def test_sympy__combinatorics__graycode__GrayCode(): + from sympy.combinatorics.graycode import GrayCode + # an integer is given and returned from GrayCode as the arg + assert _test_args(GrayCode(3, start='100')) + assert _test_args(GrayCode(3, rank=1)) + + +def test_sympy__combinatorics__permutations__Permutation(): + from sympy.combinatorics.permutations import Permutation + assert _test_args(Permutation([0, 1, 2, 3])) + +def test_sympy__combinatorics__permutations__AppliedPermutation(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.permutations import AppliedPermutation + p = Permutation([0, 1, 2, 3]) + assert _test_args(AppliedPermutation(p, x)) + +def test_sympy__combinatorics__perm_groups__PermutationGroup(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.perm_groups import PermutationGroup + assert _test_args(PermutationGroup([Permutation([0, 1])])) + + +def test_sympy__combinatorics__polyhedron__Polyhedron(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.polyhedron import Polyhedron + from sympy.abc import w, x, y, z + pgroup = [Permutation([[0, 1, 2], [3]]), + Permutation([[0, 1, 3], [2]]), + Permutation([[0, 2, 3], [1]]), + Permutation([[1, 2, 3], [0]]), + Permutation([[0, 1], [2, 3]]), + Permutation([[0, 2], [1, 3]]), + Permutation([[0, 3], [1, 2]]), + Permutation([[0, 1, 2, 3]])] + corners = [w, x, y, z] + faces = [(w, x, y), (w, y, z), (w, z, x), (x, y, z)] + assert _test_args(Polyhedron(corners, faces, pgroup)) + + +def test_sympy__combinatorics__prufer__Prufer(): + from sympy.combinatorics.prufer import Prufer + assert _test_args(Prufer([[0, 1], [0, 2], [0, 3]], 4)) + + +def test_sympy__combinatorics__partitions__Partition(): + from sympy.combinatorics.partitions import Partition + assert _test_args(Partition([1])) + + +def test_sympy__combinatorics__partitions__IntegerPartition(): + from sympy.combinatorics.partitions import IntegerPartition + assert _test_args(IntegerPartition([1])) + + +def test_sympy__concrete__products__Product(): + from sympy.concrete.products import Product + assert _test_args(Product(x, (x, 0, 10))) + assert _test_args(Product(x, (x, 0, y), (y, 0, 10))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_limits__ExprWithLimits(): + from sympy.concrete.expr_with_limits import ExprWithLimits + assert _test_args(ExprWithLimits(x, (x, 0, 10))) + assert _test_args(ExprWithLimits(x*y, (x, 0, 10.),(y,1.,3))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_limits__AddWithLimits(): + from sympy.concrete.expr_with_limits import AddWithLimits + assert _test_args(AddWithLimits(x, (x, 0, 10))) + assert _test_args(AddWithLimits(x*y, (x, 0, 10),(y,1,3))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_intlimits__ExprWithIntLimits(): + from sympy.concrete.expr_with_intlimits import ExprWithIntLimits + assert _test_args(ExprWithIntLimits(x, (x, 0, 10))) + assert _test_args(ExprWithIntLimits(x*y, (x, 0, 10),(y,1,3))) + + +def test_sympy__concrete__summations__Sum(): + from sympy.concrete.summations import Sum + assert _test_args(Sum(x, (x, 0, 10))) + assert _test_args(Sum(x, (x, 0, y), (y, 0, 10))) + + +def test_sympy__core__add__Add(): + from sympy.core.add import Add + assert _test_args(Add(x, y, z, 2)) + + +def test_sympy__core__basic__Atom(): + from sympy.core.basic import Atom + assert _test_args(Atom()) + + +def test_sympy__core__basic__Basic(): + from sympy.core.basic import Basic + assert _test_args(Basic()) + + +def test_sympy__core__containers__Dict(): + from sympy.core.containers import Dict + assert _test_args(Dict({x: y, y: z})) + + +def test_sympy__core__containers__Tuple(): + from sympy.core.containers import Tuple + assert _test_args(Tuple(x, y, z, 2)) + + +def test_sympy__core__expr__AtomicExpr(): + from sympy.core.expr import AtomicExpr + assert _test_args(AtomicExpr()) + + +def test_sympy__core__expr__Expr(): + from sympy.core.expr import Expr + assert _test_args(Expr()) + + +def test_sympy__core__expr__UnevaluatedExpr(): + from sympy.core.expr import UnevaluatedExpr + from sympy.abc import x + assert _test_args(UnevaluatedExpr(x)) + + +def test_sympy__core__function__Application(): + from sympy.core.function import Application + assert _test_args(Application(1, 2, 3)) + + +def test_sympy__core__function__AppliedUndef(): + from sympy.core.function import AppliedUndef + assert _test_args(AppliedUndef(1, 2, 3)) + + +def test_sympy__core__function__DefinedFunction(): + from sympy.core.function import DefinedFunction + assert _test_args(DefinedFunction(1, 2, 3)) + + +def test_sympy__core__function__Derivative(): + from sympy.core.function import Derivative + assert _test_args(Derivative(2, x, y, 3)) + + +@SKIP("abstract class") +def test_sympy__core__function__Function(): + pass + + +def test_sympy__core__function__Lambda(): + assert _test_args(Lambda((x, y), x + y + z)) + + +def test_sympy__core__function__Subs(): + from sympy.core.function import Subs + assert _test_args(Subs(x + y, x, 2)) + + +def test_sympy__core__function__WildFunction(): + from sympy.core.function import WildFunction + assert _test_args(WildFunction('f')) + + +def test_sympy__core__mod__Mod(): + from sympy.core.mod import Mod + assert _test_args(Mod(x, 2)) + + +def test_sympy__core__mul__Mul(): + from sympy.core.mul import Mul + assert _test_args(Mul(2, x, y, z)) + + +def test_sympy__core__numbers__Catalan(): + from sympy.core.numbers import Catalan + assert _test_args(Catalan()) + + +def test_sympy__core__numbers__ComplexInfinity(): + from sympy.core.numbers import ComplexInfinity + assert _test_args(ComplexInfinity()) + + +def test_sympy__core__numbers__EulerGamma(): + from sympy.core.numbers import EulerGamma + assert _test_args(EulerGamma()) + + +def test_sympy__core__numbers__Exp1(): + from sympy.core.numbers import Exp1 + assert _test_args(Exp1()) + + +def test_sympy__core__numbers__Float(): + from sympy.core.numbers import Float + assert _test_args(Float(1.23)) + + +def test_sympy__core__numbers__GoldenRatio(): + from sympy.core.numbers import GoldenRatio + assert _test_args(GoldenRatio()) + + +def test_sympy__core__numbers__TribonacciConstant(): + from sympy.core.numbers import TribonacciConstant + assert _test_args(TribonacciConstant()) + + +def test_sympy__core__numbers__Half(): + from sympy.core.numbers import Half + assert _test_args(Half()) + + +def test_sympy__core__numbers__ImaginaryUnit(): + from sympy.core.numbers import ImaginaryUnit + assert _test_args(ImaginaryUnit()) + + +def test_sympy__core__numbers__Infinity(): + from sympy.core.numbers import Infinity + assert _test_args(Infinity()) + + +def test_sympy__core__numbers__Integer(): + from sympy.core.numbers import Integer + assert _test_args(Integer(7)) + + +@SKIP("abstract class") +def test_sympy__core__numbers__IntegerConstant(): + pass + + +def test_sympy__core__numbers__NaN(): + from sympy.core.numbers import NaN + assert _test_args(NaN()) + + +def test_sympy__core__numbers__NegativeInfinity(): + from sympy.core.numbers import NegativeInfinity + assert _test_args(NegativeInfinity()) + + +def test_sympy__core__numbers__NegativeOne(): + from sympy.core.numbers import NegativeOne + assert _test_args(NegativeOne()) + + +def test_sympy__core__numbers__Number(): + from sympy.core.numbers import Number + assert _test_args(Number(1, 7)) + + +def test_sympy__core__numbers__NumberSymbol(): + from sympy.core.numbers import NumberSymbol + assert _test_args(NumberSymbol()) + + +def test_sympy__core__numbers__One(): + from sympy.core.numbers import One + assert _test_args(One()) + + +def test_sympy__core__numbers__Pi(): + from sympy.core.numbers import Pi + assert _test_args(Pi()) + + +def test_sympy__core__numbers__Rational(): + from sympy.core.numbers import Rational + assert _test_args(Rational(1, 7)) + + +@SKIP("abstract class") +def test_sympy__core__numbers__RationalConstant(): + pass + + +def test_sympy__core__numbers__Zero(): + from sympy.core.numbers import Zero + assert _test_args(Zero()) + + +@SKIP("abstract class") +def test_sympy__core__operations__AssocOp(): + pass + + +@SKIP("abstract class") +def test_sympy__core__operations__LatticeOp(): + pass + + +def test_sympy__core__power__Pow(): + from sympy.core.power import Pow + assert _test_args(Pow(x, 2)) + + +def test_sympy__core__relational__Equality(): + from sympy.core.relational import Equality + assert _test_args(Equality(x, 2)) + + +def test_sympy__core__relational__GreaterThan(): + from sympy.core.relational import GreaterThan + assert _test_args(GreaterThan(x, 2)) + + +def test_sympy__core__relational__LessThan(): + from sympy.core.relational import LessThan + assert _test_args(LessThan(x, 2)) + + +@SKIP("abstract class") +def test_sympy__core__relational__Relational(): + pass + + +def test_sympy__core__relational__StrictGreaterThan(): + from sympy.core.relational import StrictGreaterThan + assert _test_args(StrictGreaterThan(x, 2)) + + +def test_sympy__core__relational__StrictLessThan(): + from sympy.core.relational import StrictLessThan + assert _test_args(StrictLessThan(x, 2)) + + +def test_sympy__core__relational__Unequality(): + from sympy.core.relational import Unequality + assert _test_args(Unequality(x, 2)) + + +def test_sympy__sandbox__indexed_integrals__IndexedIntegral(): + from sympy.tensor import IndexedBase, Idx + from sympy.sandbox.indexed_integrals import IndexedIntegral + A = IndexedBase('A') + i, j = symbols('i j', integer=True) + a1, a2 = symbols('a1:3', cls=Idx) + assert _test_args(IndexedIntegral(A[a1], A[a2])) + assert _test_args(IndexedIntegral(A[i], A[j])) + + +def test_sympy__calculus__accumulationbounds__AccumulationBounds(): + from sympy.calculus.accumulationbounds import AccumulationBounds + assert _test_args(AccumulationBounds(0, 1)) + + +def test_sympy__sets__ordinals__OmegaPower(): + from sympy.sets.ordinals import OmegaPower + assert _test_args(OmegaPower(1, 1)) + +def test_sympy__sets__ordinals__Ordinal(): + from sympy.sets.ordinals import Ordinal, OmegaPower + assert _test_args(Ordinal(OmegaPower(2, 1))) + +def test_sympy__sets__ordinals__OrdinalOmega(): + from sympy.sets.ordinals import OrdinalOmega + assert _test_args(OrdinalOmega()) + +def test_sympy__sets__ordinals__OrdinalZero(): + from sympy.sets.ordinals import OrdinalZero + assert _test_args(OrdinalZero()) + + +def test_sympy__sets__powerset__PowerSet(): + from sympy.sets.powerset import PowerSet + from sympy.core.singleton import S + assert _test_args(PowerSet(S.EmptySet)) + + +def test_sympy__sets__sets__EmptySet(): + from sympy.sets.sets import EmptySet + assert _test_args(EmptySet()) + + +def test_sympy__sets__sets__UniversalSet(): + from sympy.sets.sets import UniversalSet + assert _test_args(UniversalSet()) + + +def test_sympy__sets__sets__FiniteSet(): + from sympy.sets.sets import FiniteSet + assert _test_args(FiniteSet(x, y, z)) + + +def test_sympy__sets__sets__Interval(): + from sympy.sets.sets import Interval + assert _test_args(Interval(0, 1)) + + +def test_sympy__sets__sets__ProductSet(): + from sympy.sets.sets import ProductSet, Interval + assert _test_args(ProductSet(Interval(0, 1), Interval(0, 1))) + + +@SKIP("does it make sense to test this?") +def test_sympy__sets__sets__Set(): + from sympy.sets.sets import Set + assert _test_args(Set()) + + +def test_sympy__sets__sets__Intersection(): + from sympy.sets.sets import Intersection, Interval + from sympy.core.symbol import Symbol + x = Symbol('x') + y = Symbol('y') + S = Intersection(Interval(0, x), Interval(y, 1)) + assert isinstance(S, Intersection) + assert _test_args(S) + + +def test_sympy__sets__sets__Union(): + from sympy.sets.sets import Union, Interval + assert _test_args(Union(Interval(0, 1), Interval(2, 3))) + + +def test_sympy__sets__sets__Complement(): + from sympy.sets.sets import Complement, Interval + assert _test_args(Complement(Interval(0, 2), Interval(0, 1))) + + +def test_sympy__sets__sets__SymmetricDifference(): + from sympy.sets.sets import FiniteSet, SymmetricDifference + assert _test_args(SymmetricDifference(FiniteSet(1, 2, 3), \ + FiniteSet(2, 3, 4))) + +def test_sympy__sets__sets__DisjointUnion(): + from sympy.sets.sets import FiniteSet, DisjointUnion + assert _test_args(DisjointUnion(FiniteSet(1, 2, 3), \ + FiniteSet(2, 3, 4))) + + +def test_sympy__physics__quantum__trace__Tr(): + from sympy.physics.quantum.trace import Tr + a, b = symbols('a b', commutative=False) + assert _test_args(Tr(a + b)) + + +def test_sympy__sets__setexpr__SetExpr(): + from sympy.sets.setexpr import SetExpr + from sympy.sets.sets import Interval + assert _test_args(SetExpr(Interval(0, 1))) + + +def test_sympy__sets__fancysets__Rationals(): + from sympy.sets.fancysets import Rationals + assert _test_args(Rationals()) + + +def test_sympy__sets__fancysets__Naturals(): + from sympy.sets.fancysets import Naturals + assert _test_args(Naturals()) + + +def test_sympy__sets__fancysets__Naturals0(): + from sympy.sets.fancysets import Naturals0 + assert _test_args(Naturals0()) + + +def test_sympy__sets__fancysets__Integers(): + from sympy.sets.fancysets import Integers + assert _test_args(Integers()) + + +def test_sympy__sets__fancysets__Reals(): + from sympy.sets.fancysets import Reals + assert _test_args(Reals()) + + +def test_sympy__sets__fancysets__Complexes(): + from sympy.sets.fancysets import Complexes + assert _test_args(Complexes()) + + +def test_sympy__sets__fancysets__ComplexRegion(): + from sympy.sets.fancysets import ComplexRegion + from sympy.core.singleton import S + from sympy.sets import Interval + a = Interval(0, 1) + b = Interval(2, 3) + theta = Interval(0, 2*S.Pi) + assert _test_args(ComplexRegion(a*b)) + assert _test_args(ComplexRegion(a*theta, polar=True)) + + +def test_sympy__sets__fancysets__CartesianComplexRegion(): + from sympy.sets.fancysets import CartesianComplexRegion + from sympy.sets import Interval + a = Interval(0, 1) + b = Interval(2, 3) + assert _test_args(CartesianComplexRegion(a*b)) + + +def test_sympy__sets__fancysets__PolarComplexRegion(): + from sympy.sets.fancysets import PolarComplexRegion + from sympy.core.singleton import S + from sympy.sets import Interval + a = Interval(0, 1) + theta = Interval(0, 2*S.Pi) + assert _test_args(PolarComplexRegion(a*theta)) + + +def test_sympy__sets__fancysets__ImageSet(): + from sympy.sets.fancysets import ImageSet + from sympy.core.singleton import S + from sympy.core.symbol import Symbol + x = Symbol('x') + assert _test_args(ImageSet(Lambda(x, x**2), S.Naturals)) + + +def test_sympy__sets__fancysets__Range(): + from sympy.sets.fancysets import Range + assert _test_args(Range(1, 5, 1)) + + +def test_sympy__sets__conditionset__ConditionSet(): + from sympy.sets.conditionset import ConditionSet + from sympy.core.singleton import S + from sympy.core.symbol import Symbol + x = Symbol('x') + assert _test_args(ConditionSet(x, Eq(x**2, 1), S.Reals)) + + +def test_sympy__sets__contains__Contains(): + from sympy.sets.fancysets import Range + from sympy.sets.contains import Contains + assert _test_args(Contains(x, Range(0, 10, 2))) + + +# STATS + + +from sympy.stats.crv_types import NormalDistribution +nd = NormalDistribution(0, 1) +from sympy.stats.frv_types import DieDistribution +die = DieDistribution(6) + + +def test_sympy__stats__crv__ContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import ContinuousDomain + assert _test_args(ContinuousDomain({x}, Interval(-oo, oo))) + + +def test_sympy__stats__crv__SingleContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import SingleContinuousDomain + assert _test_args(SingleContinuousDomain(x, Interval(-oo, oo))) + + +def test_sympy__stats__crv__ProductContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import SingleContinuousDomain, ProductContinuousDomain + D = SingleContinuousDomain(x, Interval(-oo, oo)) + E = SingleContinuousDomain(y, Interval(0, oo)) + assert _test_args(ProductContinuousDomain(D, E)) + + +def test_sympy__stats__crv__ConditionalContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import (SingleContinuousDomain, + ConditionalContinuousDomain) + D = SingleContinuousDomain(x, Interval(-oo, oo)) + assert _test_args(ConditionalContinuousDomain(D, x > 0)) + + +def test_sympy__stats__crv__ContinuousPSpace(): + from sympy.sets.sets import Interval + from sympy.stats.crv import ContinuousPSpace, SingleContinuousDomain + D = SingleContinuousDomain(x, Interval(-oo, oo)) + assert _test_args(ContinuousPSpace(D, nd)) + + +def test_sympy__stats__crv__SingleContinuousPSpace(): + from sympy.stats.crv import SingleContinuousPSpace + assert _test_args(SingleContinuousPSpace(x, nd)) + +@SKIP("abstract class") +def test_sympy__stats__rv__Distribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__crv__SingleContinuousDistribution(): + pass + + +def test_sympy__stats__drv__SingleDiscreteDomain(): + from sympy.stats.drv import SingleDiscreteDomain + assert _test_args(SingleDiscreteDomain(x, S.Naturals)) + + +def test_sympy__stats__drv__ProductDiscreteDomain(): + from sympy.stats.drv import SingleDiscreteDomain, ProductDiscreteDomain + X = SingleDiscreteDomain(x, S.Naturals) + Y = SingleDiscreteDomain(y, S.Integers) + assert _test_args(ProductDiscreteDomain(X, Y)) + + +def test_sympy__stats__drv__SingleDiscretePSpace(): + from sympy.stats.drv import SingleDiscretePSpace + from sympy.stats.drv_types import PoissonDistribution + assert _test_args(SingleDiscretePSpace(x, PoissonDistribution(1))) + +def test_sympy__stats__drv__DiscretePSpace(): + from sympy.stats.drv import DiscretePSpace, SingleDiscreteDomain + density = Lambda(x, 2**(-x)) + domain = SingleDiscreteDomain(x, S.Naturals) + assert _test_args(DiscretePSpace(domain, density)) + +def test_sympy__stats__drv__ConditionalDiscreteDomain(): + from sympy.stats.drv import ConditionalDiscreteDomain, SingleDiscreteDomain + X = SingleDiscreteDomain(x, S.Naturals0) + assert _test_args(ConditionalDiscreteDomain(X, x > 2)) + +def test_sympy__stats__joint_rv__JointPSpace(): + from sympy.stats.joint_rv import JointPSpace, JointDistribution + assert _test_args(JointPSpace('X', JointDistribution(1))) + +def test_sympy__stats__joint_rv__JointRandomSymbol(): + from sympy.stats.joint_rv import JointRandomSymbol + assert _test_args(JointRandomSymbol(x)) + +def test_sympy__stats__joint_rv_types__JointDistributionHandmade(): + from sympy.tensor.indexed import Indexed + from sympy.stats.joint_rv_types import JointDistributionHandmade + x1, x2 = (Indexed('x', i) for i in (1, 2)) + assert _test_args(JointDistributionHandmade(x1 + x2, S.Reals**2)) + + +def test_sympy__stats__joint_rv__MarginalDistribution(): + from sympy.stats.rv import RandomSymbol + from sympy.stats.joint_rv import MarginalDistribution + r = RandomSymbol(S('r')) + assert _test_args(MarginalDistribution(r, (r,))) + + +def test_sympy__stats__compound_rv__CompoundDistribution(): + from sympy.stats.compound_rv import CompoundDistribution + from sympy.stats.drv_types import PoissonDistribution, Poisson + r = Poisson('r', 10) + assert _test_args(CompoundDistribution(PoissonDistribution(r))) + + +def test_sympy__stats__compound_rv__CompoundPSpace(): + from sympy.stats.compound_rv import CompoundPSpace, CompoundDistribution + from sympy.stats.drv_types import PoissonDistribution, Poisson + r = Poisson('r', 5) + C = CompoundDistribution(PoissonDistribution(r)) + assert _test_args(CompoundPSpace('C', C)) + + +@SKIP("abstract class") +def test_sympy__stats__drv__SingleDiscreteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__drv__DiscreteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__drv__DiscreteDomain(): + pass + + +def test_sympy__stats__rv__RandomDomain(): + from sympy.stats.rv import RandomDomain + from sympy.sets.sets import FiniteSet + assert _test_args(RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3))) + + +def test_sympy__stats__rv__SingleDomain(): + from sympy.stats.rv import SingleDomain + from sympy.sets.sets import FiniteSet + assert _test_args(SingleDomain(x, FiniteSet(1, 2, 3))) + + +def test_sympy__stats__rv__ConditionalDomain(): + from sympy.stats.rv import ConditionalDomain, RandomDomain + from sympy.sets.sets import FiniteSet + D = RandomDomain(FiniteSet(x), FiniteSet(1, 2)) + assert _test_args(ConditionalDomain(D, x > 1)) + +def test_sympy__stats__rv__MatrixDomain(): + from sympy.stats.rv import MatrixDomain + from sympy.matrices import MatrixSet + from sympy.core.singleton import S + assert _test_args(MatrixDomain(x, MatrixSet(2, 2, S.Reals))) + +def test_sympy__stats__rv__PSpace(): + from sympy.stats.rv import PSpace, RandomDomain + from sympy.sets.sets import FiniteSet + D = RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3, 4, 5, 6)) + assert _test_args(PSpace(D, die)) + + +@SKIP("abstract Class") +def test_sympy__stats__rv__SinglePSpace(): + pass + + +def test_sympy__stats__rv__RandomSymbol(): + from sympy.stats.rv import RandomSymbol + from sympy.stats.crv import SingleContinuousPSpace + A = SingleContinuousPSpace(x, nd) + assert _test_args(RandomSymbol(x, A)) + + +@SKIP("abstract Class") +def test_sympy__stats__rv__ProductPSpace(): + pass + + +def test_sympy__stats__rv__IndependentProductPSpace(): + from sympy.stats.rv import IndependentProductPSpace + from sympy.stats.crv import SingleContinuousPSpace + A = SingleContinuousPSpace(x, nd) + B = SingleContinuousPSpace(y, nd) + assert _test_args(IndependentProductPSpace(A, B)) + + +def test_sympy__stats__rv__ProductDomain(): + from sympy.sets.sets import Interval + from sympy.stats.rv import ProductDomain, SingleDomain + D = SingleDomain(x, Interval(-oo, oo)) + E = SingleDomain(y, Interval(0, oo)) + assert _test_args(ProductDomain(D, E)) + + +def test_sympy__stats__symbolic_probability__Probability(): + from sympy.stats.symbolic_probability import Probability + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Probability(X > 0)) + + +def test_sympy__stats__symbolic_probability__Expectation(): + from sympy.stats.symbolic_probability import Expectation + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Expectation(X > 0)) + + +def test_sympy__stats__symbolic_probability__Covariance(): + from sympy.stats.symbolic_probability import Covariance + from sympy.stats import Normal + X = Normal('X', 0, 1) + Y = Normal('Y', 0, 3) + assert _test_args(Covariance(X, Y)) + + +def test_sympy__stats__symbolic_probability__Variance(): + from sympy.stats.symbolic_probability import Variance + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Variance(X)) + + +def test_sympy__stats__symbolic_probability__Moment(): + from sympy.stats.symbolic_probability import Moment + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Moment(X, 3, 2, X > 3)) + + +def test_sympy__stats__symbolic_probability__CentralMoment(): + from sympy.stats.symbolic_probability import CentralMoment + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(CentralMoment(X, 2, X > 1)) + + +def test_sympy__stats__frv_types__DiscreteUniformDistribution(): + from sympy.stats.frv_types import DiscreteUniformDistribution + from sympy.core.containers import Tuple + assert _test_args(DiscreteUniformDistribution(Tuple(*list(range(6))))) + + +def test_sympy__stats__frv_types__DieDistribution(): + assert _test_args(die) + + +def test_sympy__stats__frv_types__BernoulliDistribution(): + from sympy.stats.frv_types import BernoulliDistribution + assert _test_args(BernoulliDistribution(S.Half, 0, 1)) + + +def test_sympy__stats__frv_types__BinomialDistribution(): + from sympy.stats.frv_types import BinomialDistribution + assert _test_args(BinomialDistribution(5, S.Half, 1, 0)) + +def test_sympy__stats__frv_types__BetaBinomialDistribution(): + from sympy.stats.frv_types import BetaBinomialDistribution + assert _test_args(BetaBinomialDistribution(5, 1, 1)) + + +def test_sympy__stats__frv_types__HypergeometricDistribution(): + from sympy.stats.frv_types import HypergeometricDistribution + assert _test_args(HypergeometricDistribution(10, 5, 3)) + + +def test_sympy__stats__frv_types__RademacherDistribution(): + from sympy.stats.frv_types import RademacherDistribution + assert _test_args(RademacherDistribution()) + +def test_sympy__stats__frv_types__IdealSolitonDistribution(): + from sympy.stats.frv_types import IdealSolitonDistribution + assert _test_args(IdealSolitonDistribution(10)) + +def test_sympy__stats__frv_types__RobustSolitonDistribution(): + from sympy.stats.frv_types import RobustSolitonDistribution + assert _test_args(RobustSolitonDistribution(1000, 0.5, 0.1)) + +def test_sympy__stats__frv__FiniteDomain(): + from sympy.stats.frv import FiniteDomain + assert _test_args(FiniteDomain({(x, 1), (x, 2)})) # x can be 1 or 2 + + +def test_sympy__stats__frv__SingleFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain + assert _test_args(SingleFiniteDomain(x, {1, 2})) # x can be 1 or 2 + + +def test_sympy__stats__frv__ProductFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain, ProductFiniteDomain + xd = SingleFiniteDomain(x, {1, 2}) + yd = SingleFiniteDomain(y, {1, 2}) + assert _test_args(ProductFiniteDomain(xd, yd)) + + +def test_sympy__stats__frv__ConditionalFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain, ConditionalFiniteDomain + xd = SingleFiniteDomain(x, {1, 2}) + assert _test_args(ConditionalFiniteDomain(xd, x > 1)) + + +def test_sympy__stats__frv__FinitePSpace(): + from sympy.stats.frv import FinitePSpace, SingleFiniteDomain + xd = SingleFiniteDomain(x, {1, 2, 3, 4, 5, 6}) + assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half})) + + xd = SingleFiniteDomain(x, {1, 2}) + assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half})) + + +def test_sympy__stats__frv__SingleFinitePSpace(): + from sympy.stats.frv import SingleFinitePSpace + from sympy.core.symbol import Symbol + + assert _test_args(SingleFinitePSpace(Symbol('x'), die)) + + +def test_sympy__stats__frv__ProductFinitePSpace(): + from sympy.stats.frv import SingleFinitePSpace, ProductFinitePSpace + from sympy.core.symbol import Symbol + xp = SingleFinitePSpace(Symbol('x'), die) + yp = SingleFinitePSpace(Symbol('y'), die) + assert _test_args(ProductFinitePSpace(xp, yp)) + +@SKIP("abstract class") +def test_sympy__stats__frv__SingleFiniteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__crv__ContinuousDistribution(): + pass + + +def test_sympy__stats__frv_types__FiniteDistributionHandmade(): + from sympy.stats.frv_types import FiniteDistributionHandmade + from sympy.core.containers import Dict + assert _test_args(FiniteDistributionHandmade(Dict({1: 1}))) + + +def test_sympy__stats__crv_types__ContinuousDistributionHandmade(): + from sympy.stats.crv_types import ContinuousDistributionHandmade + from sympy.core.function import Lambda + from sympy.sets.sets import Interval + from sympy.abc import x + assert _test_args(ContinuousDistributionHandmade(Lambda(x, 2*x), + Interval(0, 1))) + + +def test_sympy__stats__drv_types__DiscreteDistributionHandmade(): + from sympy.stats.drv_types import DiscreteDistributionHandmade + from sympy.core.function import Lambda + from sympy.sets.sets import FiniteSet + from sympy.abc import x + assert _test_args(DiscreteDistributionHandmade(Lambda(x, Rational(1, 10)), + FiniteSet(*range(10)))) + + +def test_sympy__stats__rv__Density(): + from sympy.stats.rv import Density + from sympy.stats.crv_types import Normal + assert _test_args(Density(Normal('x', 0, 1))) + + +def test_sympy__stats__crv_types__ArcsinDistribution(): + from sympy.stats.crv_types import ArcsinDistribution + assert _test_args(ArcsinDistribution(0, 1)) + + +def test_sympy__stats__crv_types__BeniniDistribution(): + from sympy.stats.crv_types import BeniniDistribution + assert _test_args(BeniniDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__BetaDistribution(): + from sympy.stats.crv_types import BetaDistribution + assert _test_args(BetaDistribution(1, 1)) + +def test_sympy__stats__crv_types__BetaNoncentralDistribution(): + from sympy.stats.crv_types import BetaNoncentralDistribution + assert _test_args(BetaNoncentralDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__BetaPrimeDistribution(): + from sympy.stats.crv_types import BetaPrimeDistribution + assert _test_args(BetaPrimeDistribution(1, 1)) + +def test_sympy__stats__crv_types__BoundedParetoDistribution(): + from sympy.stats.crv_types import BoundedParetoDistribution + assert _test_args(BoundedParetoDistribution(1, 1, 2)) + +def test_sympy__stats__crv_types__CauchyDistribution(): + from sympy.stats.crv_types import CauchyDistribution + assert _test_args(CauchyDistribution(0, 1)) + + +def test_sympy__stats__crv_types__ChiDistribution(): + from sympy.stats.crv_types import ChiDistribution + assert _test_args(ChiDistribution(1)) + + +def test_sympy__stats__crv_types__ChiNoncentralDistribution(): + from sympy.stats.crv_types import ChiNoncentralDistribution + assert _test_args(ChiNoncentralDistribution(1,1)) + + +def test_sympy__stats__crv_types__ChiSquaredDistribution(): + from sympy.stats.crv_types import ChiSquaredDistribution + assert _test_args(ChiSquaredDistribution(1)) + + +def test_sympy__stats__crv_types__DagumDistribution(): + from sympy.stats.crv_types import DagumDistribution + assert _test_args(DagumDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__DavisDistribution(): + from sympy.stats.crv_types import DavisDistribution + assert _test_args(DavisDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__ExGaussianDistribution(): + from sympy.stats.crv_types import ExGaussianDistribution + assert _test_args(ExGaussianDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__ExponentialDistribution(): + from sympy.stats.crv_types import ExponentialDistribution + assert _test_args(ExponentialDistribution(1)) + + +def test_sympy__stats__crv_types__ExponentialPowerDistribution(): + from sympy.stats.crv_types import ExponentialPowerDistribution + assert _test_args(ExponentialPowerDistribution(0, 1, 1)) + + +def test_sympy__stats__crv_types__FDistributionDistribution(): + from sympy.stats.crv_types import FDistributionDistribution + assert _test_args(FDistributionDistribution(1, 1)) + + +def test_sympy__stats__crv_types__FisherZDistribution(): + from sympy.stats.crv_types import FisherZDistribution + assert _test_args(FisherZDistribution(1, 1)) + + +def test_sympy__stats__crv_types__FrechetDistribution(): + from sympy.stats.crv_types import FrechetDistribution + assert _test_args(FrechetDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__GammaInverseDistribution(): + from sympy.stats.crv_types import GammaInverseDistribution + assert _test_args(GammaInverseDistribution(1, 1)) + + +def test_sympy__stats__crv_types__GammaDistribution(): + from sympy.stats.crv_types import GammaDistribution + assert _test_args(GammaDistribution(1, 1)) + +def test_sympy__stats__crv_types__GumbelDistribution(): + from sympy.stats.crv_types import GumbelDistribution + assert _test_args(GumbelDistribution(1, 1, False)) + +def test_sympy__stats__crv_types__GompertzDistribution(): + from sympy.stats.crv_types import GompertzDistribution + assert _test_args(GompertzDistribution(1, 1)) + +def test_sympy__stats__crv_types__KumaraswamyDistribution(): + from sympy.stats.crv_types import KumaraswamyDistribution + assert _test_args(KumaraswamyDistribution(1, 1)) + +def test_sympy__stats__crv_types__LaplaceDistribution(): + from sympy.stats.crv_types import LaplaceDistribution + assert _test_args(LaplaceDistribution(0, 1)) + +def test_sympy__stats__crv_types__LevyDistribution(): + from sympy.stats.crv_types import LevyDistribution + assert _test_args(LevyDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogCauchyDistribution(): + from sympy.stats.crv_types import LogCauchyDistribution + assert _test_args(LogCauchyDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogisticDistribution(): + from sympy.stats.crv_types import LogisticDistribution + assert _test_args(LogisticDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogLogisticDistribution(): + from sympy.stats.crv_types import LogLogisticDistribution + assert _test_args(LogLogisticDistribution(1, 1)) + +def test_sympy__stats__crv_types__LogitNormalDistribution(): + from sympy.stats.crv_types import LogitNormalDistribution + assert _test_args(LogitNormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogNormalDistribution(): + from sympy.stats.crv_types import LogNormalDistribution + assert _test_args(LogNormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__LomaxDistribution(): + from sympy.stats.crv_types import LomaxDistribution + assert _test_args(LomaxDistribution(1, 2)) + +def test_sympy__stats__crv_types__MaxwellDistribution(): + from sympy.stats.crv_types import MaxwellDistribution + assert _test_args(MaxwellDistribution(1)) + +def test_sympy__stats__crv_types__MoyalDistribution(): + from sympy.stats.crv_types import MoyalDistribution + assert _test_args(MoyalDistribution(1,2)) + +def test_sympy__stats__crv_types__NakagamiDistribution(): + from sympy.stats.crv_types import NakagamiDistribution + assert _test_args(NakagamiDistribution(1, 1)) + + +def test_sympy__stats__crv_types__NormalDistribution(): + from sympy.stats.crv_types import NormalDistribution + assert _test_args(NormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__GaussianInverseDistribution(): + from sympy.stats.crv_types import GaussianInverseDistribution + assert _test_args(GaussianInverseDistribution(1, 1)) + + +def test_sympy__stats__crv_types__ParetoDistribution(): + from sympy.stats.crv_types import ParetoDistribution + assert _test_args(ParetoDistribution(1, 1)) + +def test_sympy__stats__crv_types__PowerFunctionDistribution(): + from sympy.stats.crv_types import PowerFunctionDistribution + assert _test_args(PowerFunctionDistribution(2,0,1)) + +def test_sympy__stats__crv_types__QuadraticUDistribution(): + from sympy.stats.crv_types import QuadraticUDistribution + assert _test_args(QuadraticUDistribution(1, 2)) + +def test_sympy__stats__crv_types__RaisedCosineDistribution(): + from sympy.stats.crv_types import RaisedCosineDistribution + assert _test_args(RaisedCosineDistribution(1, 1)) + +def test_sympy__stats__crv_types__RayleighDistribution(): + from sympy.stats.crv_types import RayleighDistribution + assert _test_args(RayleighDistribution(1)) + +def test_sympy__stats__crv_types__ReciprocalDistribution(): + from sympy.stats.crv_types import ReciprocalDistribution + assert _test_args(ReciprocalDistribution(5, 30)) + +def test_sympy__stats__crv_types__ShiftedGompertzDistribution(): + from sympy.stats.crv_types import ShiftedGompertzDistribution + assert _test_args(ShiftedGompertzDistribution(1, 1)) + +def test_sympy__stats__crv_types__StudentTDistribution(): + from sympy.stats.crv_types import StudentTDistribution + assert _test_args(StudentTDistribution(1)) + +def test_sympy__stats__crv_types__TrapezoidalDistribution(): + from sympy.stats.crv_types import TrapezoidalDistribution + assert _test_args(TrapezoidalDistribution(1, 2, 3, 4)) + +def test_sympy__stats__crv_types__TriangularDistribution(): + from sympy.stats.crv_types import TriangularDistribution + assert _test_args(TriangularDistribution(-1, 0, 1)) + + +def test_sympy__stats__crv_types__UniformDistribution(): + from sympy.stats.crv_types import UniformDistribution + assert _test_args(UniformDistribution(0, 1)) + + +def test_sympy__stats__crv_types__UniformSumDistribution(): + from sympy.stats.crv_types import UniformSumDistribution + assert _test_args(UniformSumDistribution(1)) + + +def test_sympy__stats__crv_types__VonMisesDistribution(): + from sympy.stats.crv_types import VonMisesDistribution + assert _test_args(VonMisesDistribution(1, 1)) + + +def test_sympy__stats__crv_types__WeibullDistribution(): + from sympy.stats.crv_types import WeibullDistribution + assert _test_args(WeibullDistribution(1, 1)) + + +def test_sympy__stats__crv_types__WignerSemicircleDistribution(): + from sympy.stats.crv_types import WignerSemicircleDistribution + assert _test_args(WignerSemicircleDistribution(1)) + + +def test_sympy__stats__drv_types__GeometricDistribution(): + from sympy.stats.drv_types import GeometricDistribution + assert _test_args(GeometricDistribution(.5)) + +def test_sympy__stats__drv_types__HermiteDistribution(): + from sympy.stats.drv_types import HermiteDistribution + assert _test_args(HermiteDistribution(1, 2)) + +def test_sympy__stats__drv_types__LogarithmicDistribution(): + from sympy.stats.drv_types import LogarithmicDistribution + assert _test_args(LogarithmicDistribution(.5)) + + +def test_sympy__stats__drv_types__NegativeBinomialDistribution(): + from sympy.stats.drv_types import NegativeBinomialDistribution + assert _test_args(NegativeBinomialDistribution(.5, .5)) + +def test_sympy__stats__drv_types__FlorySchulzDistribution(): + from sympy.stats.drv_types import FlorySchulzDistribution + assert _test_args(FlorySchulzDistribution(.5)) + +def test_sympy__stats__drv_types__PoissonDistribution(): + from sympy.stats.drv_types import PoissonDistribution + assert _test_args(PoissonDistribution(1)) + + +def test_sympy__stats__drv_types__SkellamDistribution(): + from sympy.stats.drv_types import SkellamDistribution + assert _test_args(SkellamDistribution(1, 1)) + + +def test_sympy__stats__drv_types__YuleSimonDistribution(): + from sympy.stats.drv_types import YuleSimonDistribution + assert _test_args(YuleSimonDistribution(.5)) + + +def test_sympy__stats__drv_types__ZetaDistribution(): + from sympy.stats.drv_types import ZetaDistribution + assert _test_args(ZetaDistribution(1.5)) + + +def test_sympy__stats__joint_rv__JointDistribution(): + from sympy.stats.joint_rv import JointDistribution + assert _test_args(JointDistribution(1, 2, 3, 4)) + + +def test_sympy__stats__joint_rv_types__MultivariateNormalDistribution(): + from sympy.stats.joint_rv_types import MultivariateNormalDistribution + assert _test_args( + MultivariateNormalDistribution([0, 1], [[1, 0],[0, 1]])) + +def test_sympy__stats__joint_rv_types__MultivariateLaplaceDistribution(): + from sympy.stats.joint_rv_types import MultivariateLaplaceDistribution + assert _test_args(MultivariateLaplaceDistribution([0, 1], [[1, 0],[0, 1]])) + + +def test_sympy__stats__joint_rv_types__MultivariateTDistribution(): + from sympy.stats.joint_rv_types import MultivariateTDistribution + assert _test_args(MultivariateTDistribution([0, 1], [[1, 0],[0, 1]], 1)) + + +def test_sympy__stats__joint_rv_types__NormalGammaDistribution(): + from sympy.stats.joint_rv_types import NormalGammaDistribution + assert _test_args(NormalGammaDistribution(1, 2, 3, 4)) + +def test_sympy__stats__joint_rv_types__GeneralizedMultivariateLogGammaDistribution(): + from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaDistribution + v, l, mu = (4, [1, 2, 3, 4], [1, 2, 3, 4]) + assert _test_args(GeneralizedMultivariateLogGammaDistribution(S.Half, v, l, mu)) + +def test_sympy__stats__joint_rv_types__MultivariateBetaDistribution(): + from sympy.stats.joint_rv_types import MultivariateBetaDistribution + assert _test_args(MultivariateBetaDistribution([1, 2, 3])) + +def test_sympy__stats__joint_rv_types__MultivariateEwensDistribution(): + from sympy.stats.joint_rv_types import MultivariateEwensDistribution + assert _test_args(MultivariateEwensDistribution(5, 1)) + +def test_sympy__stats__joint_rv_types__MultinomialDistribution(): + from sympy.stats.joint_rv_types import MultinomialDistribution + assert _test_args(MultinomialDistribution(5, [0.5, 0.1, 0.3])) + +def test_sympy__stats__joint_rv_types__NegativeMultinomialDistribution(): + from sympy.stats.joint_rv_types import NegativeMultinomialDistribution + assert _test_args(NegativeMultinomialDistribution(5, [0.5, 0.1, 0.3])) + +def test_sympy__stats__rv__RandomIndexedSymbol(): + from sympy.stats.rv import RandomIndexedSymbol, pspace + from sympy.stats.stochastic_process_types import DiscreteMarkovChain + X = DiscreteMarkovChain("X") + assert _test_args(RandomIndexedSymbol(X[0].symbol, pspace(X[0]))) + +def test_sympy__stats__rv__RandomMatrixSymbol(): + from sympy.stats.rv import RandomMatrixSymbol + from sympy.stats.random_matrix import RandomMatrixPSpace + pspace = RandomMatrixPSpace('P') + assert _test_args(RandomMatrixSymbol('M', 3, 3, pspace)) + +def test_sympy__stats__stochastic_process__StochasticPSpace(): + from sympy.stats.stochastic_process import StochasticPSpace + from sympy.stats.stochastic_process_types import StochasticProcess + from sympy.stats.frv_types import BernoulliDistribution + assert _test_args(StochasticPSpace("Y", StochasticProcess("Y", [1, 2, 3]), BernoulliDistribution(S.Half, 1, 0))) + +def test_sympy__stats__stochastic_process_types__StochasticProcess(): + from sympy.stats.stochastic_process_types import StochasticProcess + assert _test_args(StochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__MarkovProcess(): + from sympy.stats.stochastic_process_types import MarkovProcess + assert _test_args(MarkovProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__DiscreteTimeStochasticProcess(): + from sympy.stats.stochastic_process_types import DiscreteTimeStochasticProcess + assert _test_args(DiscreteTimeStochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__ContinuousTimeStochasticProcess(): + from sympy.stats.stochastic_process_types import ContinuousTimeStochasticProcess + assert _test_args(ContinuousTimeStochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__TransitionMatrixOf(): + from sympy.stats.stochastic_process_types import TransitionMatrixOf, DiscreteMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + DMC = DiscreteMarkovChain("Y") + assert _test_args(TransitionMatrixOf(DMC, MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__GeneratorMatrixOf(): + from sympy.stats.stochastic_process_types import GeneratorMatrixOf, ContinuousMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + DMC = ContinuousMarkovChain("Y") + assert _test_args(GeneratorMatrixOf(DMC, MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__StochasticStateSpaceOf(): + from sympy.stats.stochastic_process_types import StochasticStateSpaceOf, DiscreteMarkovChain + DMC = DiscreteMarkovChain("Y") + assert _test_args(StochasticStateSpaceOf(DMC, [0, 1, 2])) + +def test_sympy__stats__stochastic_process_types__DiscreteMarkovChain(): + from sympy.stats.stochastic_process_types import DiscreteMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(DiscreteMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__ContinuousMarkovChain(): + from sympy.stats.stochastic_process_types import ContinuousMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(ContinuousMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__BernoulliProcess(): + from sympy.stats.stochastic_process_types import BernoulliProcess + assert _test_args(BernoulliProcess("B", 0.5, 1, 0)) + +def test_sympy__stats__stochastic_process_types__CountingProcess(): + from sympy.stats.stochastic_process_types import CountingProcess + assert _test_args(CountingProcess("C")) + +def test_sympy__stats__stochastic_process_types__PoissonProcess(): + from sympy.stats.stochastic_process_types import PoissonProcess + assert _test_args(PoissonProcess("X", 2)) + +def test_sympy__stats__stochastic_process_types__WienerProcess(): + from sympy.stats.stochastic_process_types import WienerProcess + assert _test_args(WienerProcess("X")) + +def test_sympy__stats__stochastic_process_types__GammaProcess(): + from sympy.stats.stochastic_process_types import GammaProcess + assert _test_args(GammaProcess("X", 1, 2)) + +def test_sympy__stats__random_matrix__RandomMatrixPSpace(): + from sympy.stats.random_matrix import RandomMatrixPSpace + from sympy.stats.random_matrix_models import RandomMatrixEnsembleModel + model = RandomMatrixEnsembleModel('R', 3) + assert _test_args(RandomMatrixPSpace('P', model=model)) + +def test_sympy__stats__random_matrix_models__RandomMatrixEnsembleModel(): + from sympy.stats.random_matrix_models import RandomMatrixEnsembleModel + assert _test_args(RandomMatrixEnsembleModel('R', 3)) + +def test_sympy__stats__random_matrix_models__GaussianEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianEnsembleModel + assert _test_args(GaussianEnsembleModel('G', 3)) + +def test_sympy__stats__random_matrix_models__GaussianUnitaryEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianUnitaryEnsembleModel + assert _test_args(GaussianUnitaryEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__GaussianOrthogonalEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianOrthogonalEnsembleModel + assert _test_args(GaussianOrthogonalEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__GaussianSymplecticEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianSymplecticEnsembleModel + assert _test_args(GaussianSymplecticEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__CircularEnsembleModel(): + from sympy.stats.random_matrix_models import CircularEnsembleModel + assert _test_args(CircularEnsembleModel('C', 3)) + +def test_sympy__stats__random_matrix_models__CircularUnitaryEnsembleModel(): + from sympy.stats.random_matrix_models import CircularUnitaryEnsembleModel + assert _test_args(CircularUnitaryEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__CircularOrthogonalEnsembleModel(): + from sympy.stats.random_matrix_models import CircularOrthogonalEnsembleModel + assert _test_args(CircularOrthogonalEnsembleModel('O', 3)) + +def test_sympy__stats__random_matrix_models__CircularSymplecticEnsembleModel(): + from sympy.stats.random_matrix_models import CircularSymplecticEnsembleModel + assert _test_args(CircularSymplecticEnsembleModel('S', 3)) + +def test_sympy__stats__symbolic_multivariate_probability__ExpectationMatrix(): + from sympy.stats import ExpectationMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(ExpectationMatrix(RandomMatrixSymbol('R', 2, 1))) + +def test_sympy__stats__symbolic_multivariate_probability__VarianceMatrix(): + from sympy.stats import VarianceMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(VarianceMatrix(RandomMatrixSymbol('R', 3, 1))) + +def test_sympy__stats__symbolic_multivariate_probability__CrossCovarianceMatrix(): + from sympy.stats import CrossCovarianceMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(CrossCovarianceMatrix(RandomMatrixSymbol('R', 3, 1), + RandomMatrixSymbol('X', 3, 1))) + +def test_sympy__stats__matrix_distributions__MatrixPSpace(): + from sympy.stats.matrix_distributions import MatrixDistribution, MatrixPSpace + from sympy.matrices.dense import Matrix + M = MatrixDistribution(1, Matrix([[1, 0], [0, 1]])) + assert _test_args(MatrixPSpace('M', M, 2, 2)) + +def test_sympy__stats__matrix_distributions__MatrixDistribution(): + from sympy.stats.matrix_distributions import MatrixDistribution + from sympy.matrices.dense import Matrix + assert _test_args(MatrixDistribution(1, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__MatrixGammaDistribution(): + from sympy.stats.matrix_distributions import MatrixGammaDistribution + from sympy.matrices.dense import Matrix + assert _test_args(MatrixGammaDistribution(3, 4, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__WishartDistribution(): + from sympy.stats.matrix_distributions import WishartDistribution + from sympy.matrices.dense import Matrix + assert _test_args(WishartDistribution(3, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__MatrixNormalDistribution(): + from sympy.stats.matrix_distributions import MatrixNormalDistribution + from sympy.matrices.expressions.matexpr import MatrixSymbol + L = MatrixSymbol('L', 1, 2) + S1 = MatrixSymbol('S1', 1, 1) + S2 = MatrixSymbol('S2', 2, 2) + assert _test_args(MatrixNormalDistribution(L, S1, S2)) + +def test_sympy__stats__matrix_distributions__MatrixStudentTDistribution(): + from sympy.stats.matrix_distributions import MatrixStudentTDistribution + from sympy.matrices.expressions.matexpr import MatrixSymbol + v = symbols('v', positive=True) + Omega = MatrixSymbol('Omega', 3, 3) + Sigma = MatrixSymbol('Sigma', 1, 1) + Location = MatrixSymbol('Location', 1, 3) + assert _test_args(MatrixStudentTDistribution(v, Location, Omega, Sigma)) + +def test_sympy__utilities__matchpy_connector__WildDot(): + from sympy.utilities.matchpy_connector import WildDot + assert _test_args(WildDot("w_")) + + +def test_sympy__utilities__matchpy_connector__WildPlus(): + from sympy.utilities.matchpy_connector import WildPlus + assert _test_args(WildPlus("w__")) + + +def test_sympy__utilities__matchpy_connector__WildStar(): + from sympy.utilities.matchpy_connector import WildStar + assert _test_args(WildStar("w___")) + + +def test_sympy__core__symbol__Str(): + from sympy.core.symbol import Str + assert _test_args(Str('t')) + +def test_sympy__core__symbol__Dummy(): + from sympy.core.symbol import Dummy + assert _test_args(Dummy('t')) + + +def test_sympy__core__symbol__Symbol(): + from sympy.core.symbol import Symbol + assert _test_args(Symbol('t')) + + +def test_sympy__core__symbol__Wild(): + from sympy.core.symbol import Wild + assert _test_args(Wild('x', exclude=[x])) + + +@SKIP("abstract class") +def test_sympy__functions__combinatorial__factorials__CombinatorialFunction(): + pass + + +def test_sympy__functions__combinatorial__factorials__FallingFactorial(): + from sympy.functions.combinatorial.factorials import FallingFactorial + assert _test_args(FallingFactorial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__MultiFactorial(): + from sympy.functions.combinatorial.factorials import MultiFactorial + assert _test_args(MultiFactorial(x)) + + +def test_sympy__functions__combinatorial__factorials__RisingFactorial(): + from sympy.functions.combinatorial.factorials import RisingFactorial + assert _test_args(RisingFactorial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__binomial(): + from sympy.functions.combinatorial.factorials import binomial + assert _test_args(binomial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__subfactorial(): + from sympy.functions.combinatorial.factorials import subfactorial + assert _test_args(subfactorial(x)) + + +def test_sympy__functions__combinatorial__factorials__factorial(): + from sympy.functions.combinatorial.factorials import factorial + assert _test_args(factorial(x)) + + +def test_sympy__functions__combinatorial__factorials__factorial2(): + from sympy.functions.combinatorial.factorials import factorial2 + assert _test_args(factorial2(x)) + + +def test_sympy__functions__combinatorial__numbers__bell(): + from sympy.functions.combinatorial.numbers import bell + assert _test_args(bell(x, y)) + + +def test_sympy__functions__combinatorial__numbers__bernoulli(): + from sympy.functions.combinatorial.numbers import bernoulli + assert _test_args(bernoulli(x)) + + +def test_sympy__functions__combinatorial__numbers__catalan(): + from sympy.functions.combinatorial.numbers import catalan + assert _test_args(catalan(x)) + + +def test_sympy__functions__combinatorial__numbers__genocchi(): + from sympy.functions.combinatorial.numbers import genocchi + assert _test_args(genocchi(x)) + + +def test_sympy__functions__combinatorial__numbers__euler(): + from sympy.functions.combinatorial.numbers import euler + assert _test_args(euler(x)) + + +def test_sympy__functions__combinatorial__numbers__andre(): + from sympy.functions.combinatorial.numbers import andre + assert _test_args(andre(x)) + + +def test_sympy__functions__combinatorial__numbers__carmichael(): + from sympy.functions.combinatorial.numbers import carmichael + assert _test_args(carmichael(x)) + + +def test_sympy__functions__combinatorial__numbers__divisor_sigma(): + from sympy.functions.combinatorial.numbers import divisor_sigma + k = symbols('k', integer=True) + n = symbols('n', integer=True) + t = divisor_sigma(n, k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__fibonacci(): + from sympy.functions.combinatorial.numbers import fibonacci + assert _test_args(fibonacci(x)) + + +def test_sympy__functions__combinatorial__numbers__jacobi_symbol(): + from sympy.functions.combinatorial.numbers import jacobi_symbol + assert _test_args(jacobi_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__kronecker_symbol(): + from sympy.functions.combinatorial.numbers import kronecker_symbol + assert _test_args(kronecker_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__legendre_symbol(): + from sympy.functions.combinatorial.numbers import legendre_symbol + assert _test_args(legendre_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__mobius(): + from sympy.functions.combinatorial.numbers import mobius + assert _test_args(mobius(2)) + + +def test_sympy__functions__combinatorial__numbers__motzkin(): + from sympy.functions.combinatorial.numbers import motzkin + assert _test_args(motzkin(5)) + + +def test_sympy__functions__combinatorial__numbers__partition(): + from sympy.core.symbol import Symbol + from sympy.functions.combinatorial.numbers import partition + assert _test_args(partition(Symbol('a', integer=True))) + + +def test_sympy__functions__combinatorial__numbers__primenu(): + from sympy.functions.combinatorial.numbers import primenu + n = symbols('n', integer=True) + t = primenu(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__primeomega(): + from sympy.functions.combinatorial.numbers import primeomega + n = symbols('n', integer=True) + t = primeomega(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__primepi(): + from sympy.functions.combinatorial.numbers import primepi + n = symbols('n') + t = primepi(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__reduced_totient(): + from sympy.functions.combinatorial.numbers import reduced_totient + k = symbols('k', integer=True) + t = reduced_totient(k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__totient(): + from sympy.functions.combinatorial.numbers import totient + k = symbols('k', integer=True) + t = totient(k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__tribonacci(): + from sympy.functions.combinatorial.numbers import tribonacci + assert _test_args(tribonacci(x)) + + +def test_sympy__functions__combinatorial__numbers__udivisor_sigma(): + from sympy.functions.combinatorial.numbers import udivisor_sigma + k = symbols('k', integer=True) + n = symbols('n', integer=True) + t = udivisor_sigma(n, k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__harmonic(): + from sympy.functions.combinatorial.numbers import harmonic + assert _test_args(harmonic(x, 2)) + + +def test_sympy__functions__combinatorial__numbers__lucas(): + from sympy.functions.combinatorial.numbers import lucas + assert _test_args(lucas(x)) + + +def test_sympy__functions__elementary__complexes__Abs(): + from sympy.functions.elementary.complexes import Abs + assert _test_args(Abs(x)) + + +def test_sympy__functions__elementary__complexes__adjoint(): + from sympy.functions.elementary.complexes import adjoint + assert _test_args(adjoint(x)) + + +def test_sympy__functions__elementary__complexes__arg(): + from sympy.functions.elementary.complexes import arg + assert _test_args(arg(x)) + + +def test_sympy__functions__elementary__complexes__conjugate(): + from sympy.functions.elementary.complexes import conjugate + assert _test_args(conjugate(x)) + + +def test_sympy__functions__elementary__complexes__im(): + from sympy.functions.elementary.complexes import im + assert _test_args(im(x)) + + +def test_sympy__functions__elementary__complexes__re(): + from sympy.functions.elementary.complexes import re + assert _test_args(re(x)) + + +def test_sympy__functions__elementary__complexes__sign(): + from sympy.functions.elementary.complexes import sign + assert _test_args(sign(x)) + + +def test_sympy__functions__elementary__complexes__polar_lift(): + from sympy.functions.elementary.complexes import polar_lift + assert _test_args(polar_lift(x)) + + +def test_sympy__functions__elementary__complexes__periodic_argument(): + from sympy.functions.elementary.complexes import periodic_argument + assert _test_args(periodic_argument(x, y)) + + +def test_sympy__functions__elementary__complexes__principal_branch(): + from sympy.functions.elementary.complexes import principal_branch + assert _test_args(principal_branch(x, y)) + + +def test_sympy__functions__elementary__complexes__transpose(): + from sympy.functions.elementary.complexes import transpose + assert _test_args(transpose(x)) + + +def test_sympy__functions__elementary__exponential__LambertW(): + from sympy.functions.elementary.exponential import LambertW + assert _test_args(LambertW(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__exponential__ExpBase(): + pass + + +def test_sympy__functions__elementary__exponential__exp(): + from sympy.functions.elementary.exponential import exp + assert _test_args(exp(2)) + + +def test_sympy__functions__elementary__exponential__exp_polar(): + from sympy.functions.elementary.exponential import exp_polar + assert _test_args(exp_polar(2)) + + +def test_sympy__functions__elementary__exponential__log(): + from sympy.functions.elementary.exponential import log + assert _test_args(log(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__HyperbolicFunction(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__ReciprocalHyperbolicFunction(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__InverseHyperbolicFunction(): + pass + + +def test_sympy__functions__elementary__hyperbolic__acosh(): + from sympy.functions.elementary.hyperbolic import acosh + assert _test_args(acosh(2)) + + +def test_sympy__functions__elementary__hyperbolic__acoth(): + from sympy.functions.elementary.hyperbolic import acoth + assert _test_args(acoth(2)) + + +def test_sympy__functions__elementary__hyperbolic__asinh(): + from sympy.functions.elementary.hyperbolic import asinh + assert _test_args(asinh(2)) + + +def test_sympy__functions__elementary__hyperbolic__atanh(): + from sympy.functions.elementary.hyperbolic import atanh + assert _test_args(atanh(2)) + + +def test_sympy__functions__elementary__hyperbolic__asech(): + from sympy.functions.elementary.hyperbolic import asech + assert _test_args(asech(x)) + +def test_sympy__functions__elementary__hyperbolic__acsch(): + from sympy.functions.elementary.hyperbolic import acsch + assert _test_args(acsch(x)) + +def test_sympy__functions__elementary__hyperbolic__cosh(): + from sympy.functions.elementary.hyperbolic import cosh + assert _test_args(cosh(2)) + + +def test_sympy__functions__elementary__hyperbolic__coth(): + from sympy.functions.elementary.hyperbolic import coth + assert _test_args(coth(2)) + + +def test_sympy__functions__elementary__hyperbolic__csch(): + from sympy.functions.elementary.hyperbolic import csch + assert _test_args(csch(2)) + + +def test_sympy__functions__elementary__hyperbolic__sech(): + from sympy.functions.elementary.hyperbolic import sech + assert _test_args(sech(2)) + + +def test_sympy__functions__elementary__hyperbolic__sinh(): + from sympy.functions.elementary.hyperbolic import sinh + assert _test_args(sinh(2)) + + +def test_sympy__functions__elementary__hyperbolic__tanh(): + from sympy.functions.elementary.hyperbolic import tanh + assert _test_args(tanh(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__integers__RoundFunction(): + pass + + +def test_sympy__functions__elementary__integers__ceiling(): + from sympy.functions.elementary.integers import ceiling + assert _test_args(ceiling(x)) + + +def test_sympy__functions__elementary__integers__floor(): + from sympy.functions.elementary.integers import floor + assert _test_args(floor(x)) + + +def test_sympy__functions__elementary__integers__frac(): + from sympy.functions.elementary.integers import frac + assert _test_args(frac(x)) + + +def test_sympy__functions__elementary__miscellaneous__IdentityFunction(): + from sympy.functions.elementary.miscellaneous import IdentityFunction + assert _test_args(IdentityFunction()) + + +def test_sympy__functions__elementary__miscellaneous__Max(): + from sympy.functions.elementary.miscellaneous import Max + assert _test_args(Max(x, 2)) + + +def test_sympy__functions__elementary__miscellaneous__Min(): + from sympy.functions.elementary.miscellaneous import Min + assert _test_args(Min(x, 2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__miscellaneous__MinMaxBase(): + pass + + +def test_sympy__functions__elementary__miscellaneous__Rem(): + from sympy.functions.elementary.miscellaneous import Rem + assert _test_args(Rem(x, 2)) + + +def test_sympy__functions__elementary__piecewise__ExprCondPair(): + from sympy.functions.elementary.piecewise import ExprCondPair + assert _test_args(ExprCondPair(1, True)) + + +def test_sympy__functions__elementary__piecewise__Piecewise(): + from sympy.functions.elementary.piecewise import Piecewise + assert _test_args(Piecewise((1, x >= 0), (0, True))) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__TrigonometricFunction(): + pass + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__ReciprocalTrigonometricFunction(): + pass + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__InverseTrigonometricFunction(): + pass + +def test_sympy__functions__elementary__trigonometric__acos(): + from sympy.functions.elementary.trigonometric import acos + assert _test_args(acos(2)) + + +def test_sympy__functions__elementary__trigonometric__acot(): + from sympy.functions.elementary.trigonometric import acot + assert _test_args(acot(2)) + + +def test_sympy__functions__elementary__trigonometric__asin(): + from sympy.functions.elementary.trigonometric import asin + assert _test_args(asin(2)) + + +def test_sympy__functions__elementary__trigonometric__asec(): + from sympy.functions.elementary.trigonometric import asec + assert _test_args(asec(x)) + + +def test_sympy__functions__elementary__trigonometric__acsc(): + from sympy.functions.elementary.trigonometric import acsc + assert _test_args(acsc(x)) + + +def test_sympy__functions__elementary__trigonometric__atan(): + from sympy.functions.elementary.trigonometric import atan + assert _test_args(atan(2)) + + +def test_sympy__functions__elementary__trigonometric__atan2(): + from sympy.functions.elementary.trigonometric import atan2 + assert _test_args(atan2(2, 3)) + + +def test_sympy__functions__elementary__trigonometric__cos(): + from sympy.functions.elementary.trigonometric import cos + assert _test_args(cos(2)) + + +def test_sympy__functions__elementary__trigonometric__csc(): + from sympy.functions.elementary.trigonometric import csc + assert _test_args(csc(2)) + + +def test_sympy__functions__elementary__trigonometric__cot(): + from sympy.functions.elementary.trigonometric import cot + assert _test_args(cot(2)) + + +def test_sympy__functions__elementary__trigonometric__sin(): + assert _test_args(sin(2)) + + +def test_sympy__functions__elementary__trigonometric__sinc(): + from sympy.functions.elementary.trigonometric import sinc + assert _test_args(sinc(2)) + + +def test_sympy__functions__elementary__trigonometric__sec(): + from sympy.functions.elementary.trigonometric import sec + assert _test_args(sec(2)) + + +def test_sympy__functions__elementary__trigonometric__tan(): + from sympy.functions.elementary.trigonometric import tan + assert _test_args(tan(2)) + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__BesselBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__SphericalBesselBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__SphericalHankelBase(): + pass + + +def test_sympy__functions__special__bessel__besseli(): + from sympy.functions.special.bessel import besseli + assert _test_args(besseli(x, 1)) + + +def test_sympy__functions__special__bessel__besselj(): + from sympy.functions.special.bessel import besselj + assert _test_args(besselj(x, 1)) + + +def test_sympy__functions__special__bessel__besselk(): + from sympy.functions.special.bessel import besselk + assert _test_args(besselk(x, 1)) + + +def test_sympy__functions__special__bessel__bessely(): + from sympy.functions.special.bessel import bessely + assert _test_args(bessely(x, 1)) + + +def test_sympy__functions__special__bessel__hankel1(): + from sympy.functions.special.bessel import hankel1 + assert _test_args(hankel1(x, 1)) + + +def test_sympy__functions__special__bessel__hankel2(): + from sympy.functions.special.bessel import hankel2 + assert _test_args(hankel2(x, 1)) + + +def test_sympy__functions__special__bessel__jn(): + from sympy.functions.special.bessel import jn + assert _test_args(jn(0, x)) + + +def test_sympy__functions__special__bessel__yn(): + from sympy.functions.special.bessel import yn + assert _test_args(yn(0, x)) + + +def test_sympy__functions__special__bessel__hn1(): + from sympy.functions.special.bessel import hn1 + assert _test_args(hn1(0, x)) + + +def test_sympy__functions__special__bessel__hn2(): + from sympy.functions.special.bessel import hn2 + assert _test_args(hn2(0, x)) + + +def test_sympy__functions__special__bessel__AiryBase(): + pass + + +def test_sympy__functions__special__bessel__airyai(): + from sympy.functions.special.bessel import airyai + assert _test_args(airyai(2)) + + +def test_sympy__functions__special__bessel__airybi(): + from sympy.functions.special.bessel import airybi + assert _test_args(airybi(2)) + + +def test_sympy__functions__special__bessel__airyaiprime(): + from sympy.functions.special.bessel import airyaiprime + assert _test_args(airyaiprime(2)) + + +def test_sympy__functions__special__bessel__airybiprime(): + from sympy.functions.special.bessel import airybiprime + assert _test_args(airybiprime(2)) + + +def test_sympy__functions__special__bessel__marcumq(): + from sympy.functions.special.bessel import marcumq + assert _test_args(marcumq(x, y, z)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_k(): + from sympy.functions.special.elliptic_integrals import elliptic_k as K + assert _test_args(K(x)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_f(): + from sympy.functions.special.elliptic_integrals import elliptic_f as F + assert _test_args(F(x, y)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_e(): + from sympy.functions.special.elliptic_integrals import elliptic_e as E + assert _test_args(E(x)) + assert _test_args(E(x, y)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_pi(): + from sympy.functions.special.elliptic_integrals import elliptic_pi as P + assert _test_args(P(x, y)) + assert _test_args(P(x, y, z)) + + +def test_sympy__functions__special__delta_functions__DiracDelta(): + from sympy.functions.special.delta_functions import DiracDelta + assert _test_args(DiracDelta(x, 1)) + + +def test_sympy__functions__special__singularity_functions__SingularityFunction(): + from sympy.functions.special.singularity_functions import SingularityFunction + assert _test_args(SingularityFunction(x, y, z)) + + +def test_sympy__functions__special__delta_functions__Heaviside(): + from sympy.functions.special.delta_functions import Heaviside + assert _test_args(Heaviside(x)) + + +def test_sympy__functions__special__error_functions__erf(): + from sympy.functions.special.error_functions import erf + assert _test_args(erf(2)) + +def test_sympy__functions__special__error_functions__erfc(): + from sympy.functions.special.error_functions import erfc + assert _test_args(erfc(2)) + +def test_sympy__functions__special__error_functions__erfi(): + from sympy.functions.special.error_functions import erfi + assert _test_args(erfi(2)) + +def test_sympy__functions__special__error_functions__erf2(): + from sympy.functions.special.error_functions import erf2 + assert _test_args(erf2(2, 3)) + +def test_sympy__functions__special__error_functions__erfinv(): + from sympy.functions.special.error_functions import erfinv + assert _test_args(erfinv(2)) + +def test_sympy__functions__special__error_functions__erfcinv(): + from sympy.functions.special.error_functions import erfcinv + assert _test_args(erfcinv(2)) + +def test_sympy__functions__special__error_functions__erf2inv(): + from sympy.functions.special.error_functions import erf2inv + assert _test_args(erf2inv(2, 3)) + +@SKIP("abstract class") +def test_sympy__functions__special__error_functions__FresnelIntegral(): + pass + + +def test_sympy__functions__special__error_functions__fresnels(): + from sympy.functions.special.error_functions import fresnels + assert _test_args(fresnels(2)) + + +def test_sympy__functions__special__error_functions__fresnelc(): + from sympy.functions.special.error_functions import fresnelc + assert _test_args(fresnelc(2)) + + +def test_sympy__functions__special__error_functions__erfs(): + from sympy.functions.special.error_functions import _erfs + assert _test_args(_erfs(2)) + + +def test_sympy__functions__special__error_functions__Ei(): + from sympy.functions.special.error_functions import Ei + assert _test_args(Ei(2)) + + +def test_sympy__functions__special__error_functions__li(): + from sympy.functions.special.error_functions import li + assert _test_args(li(2)) + + +def test_sympy__functions__special__error_functions__Li(): + from sympy.functions.special.error_functions import Li + assert _test_args(Li(5)) + + +@SKIP("abstract class") +def test_sympy__functions__special__error_functions__TrigonometricIntegral(): + pass + + +def test_sympy__functions__special__error_functions__Si(): + from sympy.functions.special.error_functions import Si + assert _test_args(Si(2)) + + +def test_sympy__functions__special__error_functions__Ci(): + from sympy.functions.special.error_functions import Ci + assert _test_args(Ci(2)) + + +def test_sympy__functions__special__error_functions__Shi(): + from sympy.functions.special.error_functions import Shi + assert _test_args(Shi(2)) + + +def test_sympy__functions__special__error_functions__Chi(): + from sympy.functions.special.error_functions import Chi + assert _test_args(Chi(2)) + + +def test_sympy__functions__special__error_functions__expint(): + from sympy.functions.special.error_functions import expint + assert _test_args(expint(y, x)) + + +def test_sympy__functions__special__gamma_functions__gamma(): + from sympy.functions.special.gamma_functions import gamma + assert _test_args(gamma(x)) + + +def test_sympy__functions__special__gamma_functions__loggamma(): + from sympy.functions.special.gamma_functions import loggamma + assert _test_args(loggamma(x)) + + +def test_sympy__functions__special__gamma_functions__lowergamma(): + from sympy.functions.special.gamma_functions import lowergamma + assert _test_args(lowergamma(x, 2)) + + +def test_sympy__functions__special__gamma_functions__polygamma(): + from sympy.functions.special.gamma_functions import polygamma + assert _test_args(polygamma(x, 2)) + +def test_sympy__functions__special__gamma_functions__digamma(): + from sympy.functions.special.gamma_functions import digamma + assert _test_args(digamma(x)) + +def test_sympy__functions__special__gamma_functions__trigamma(): + from sympy.functions.special.gamma_functions import trigamma + assert _test_args(trigamma(x)) + +def test_sympy__functions__special__gamma_functions__uppergamma(): + from sympy.functions.special.gamma_functions import uppergamma + assert _test_args(uppergamma(x, 2)) + +def test_sympy__functions__special__gamma_functions__multigamma(): + from sympy.functions.special.gamma_functions import multigamma + assert _test_args(multigamma(x, 1)) + + +def test_sympy__functions__special__beta_functions__beta(): + from sympy.functions.special.beta_functions import beta + assert _test_args(beta(x)) + assert _test_args(beta(x, x)) + +def test_sympy__functions__special__beta_functions__betainc(): + from sympy.functions.special.beta_functions import betainc + assert _test_args(betainc(a, b, x, y)) + +def test_sympy__functions__special__beta_functions__betainc_regularized(): + from sympy.functions.special.beta_functions import betainc_regularized + assert _test_args(betainc_regularized(a, b, x, y)) + + +def test_sympy__functions__special__mathieu_functions__MathieuBase(): + pass + + +def test_sympy__functions__special__mathieu_functions__mathieus(): + from sympy.functions.special.mathieu_functions import mathieus + assert _test_args(mathieus(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieuc(): + from sympy.functions.special.mathieu_functions import mathieuc + assert _test_args(mathieuc(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieusprime(): + from sympy.functions.special.mathieu_functions import mathieusprime + assert _test_args(mathieusprime(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieucprime(): + from sympy.functions.special.mathieu_functions import mathieucprime + assert _test_args(mathieucprime(1, 1, 1)) + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__TupleParametersBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__TupleArg(): + pass + + +def test_sympy__functions__special__hyper__hyper(): + from sympy.functions.special.hyper import hyper + assert _test_args(hyper([1, 2, 3], [4, 5], x)) + + +def test_sympy__functions__special__hyper__meijerg(): + from sympy.functions.special.hyper import meijerg + assert _test_args(meijerg([1, 2, 3], [4, 5], [6], [], x)) + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__HyperRep(): + pass + + +def test_sympy__functions__special__hyper__HyperRep_power1(): + from sympy.functions.special.hyper import HyperRep_power1 + assert _test_args(HyperRep_power1(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_power2(): + from sympy.functions.special.hyper import HyperRep_power2 + assert _test_args(HyperRep_power2(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_log1(): + from sympy.functions.special.hyper import HyperRep_log1 + assert _test_args(HyperRep_log1(x)) + + +def test_sympy__functions__special__hyper__HyperRep_atanh(): + from sympy.functions.special.hyper import HyperRep_atanh + assert _test_args(HyperRep_atanh(x)) + + +def test_sympy__functions__special__hyper__HyperRep_asin1(): + from sympy.functions.special.hyper import HyperRep_asin1 + assert _test_args(HyperRep_asin1(x)) + + +def test_sympy__functions__special__hyper__HyperRep_asin2(): + from sympy.functions.special.hyper import HyperRep_asin2 + assert _test_args(HyperRep_asin2(x)) + + +def test_sympy__functions__special__hyper__HyperRep_sqrts1(): + from sympy.functions.special.hyper import HyperRep_sqrts1 + assert _test_args(HyperRep_sqrts1(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_sqrts2(): + from sympy.functions.special.hyper import HyperRep_sqrts2 + assert _test_args(HyperRep_sqrts2(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_log2(): + from sympy.functions.special.hyper import HyperRep_log2 + assert _test_args(HyperRep_log2(x)) + + +def test_sympy__functions__special__hyper__HyperRep_cosasin(): + from sympy.functions.special.hyper import HyperRep_cosasin + assert _test_args(HyperRep_cosasin(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_sinasin(): + from sympy.functions.special.hyper import HyperRep_sinasin + assert _test_args(HyperRep_sinasin(x, y)) + +def test_sympy__functions__special__hyper__appellf1(): + from sympy.functions.special.hyper import appellf1 + a, b1, b2, c, x, y = symbols('a b1 b2 c x y') + assert _test_args(appellf1(a, b1, b2, c, x, y)) + +@SKIP("abstract class") +def test_sympy__functions__special__polynomials__OrthogonalPolynomial(): + pass + + +def test_sympy__functions__special__polynomials__jacobi(): + from sympy.functions.special.polynomials import jacobi + assert _test_args(jacobi(x, y, 2, 2)) + + +def test_sympy__functions__special__polynomials__gegenbauer(): + from sympy.functions.special.polynomials import gegenbauer + assert _test_args(gegenbauer(x, 2, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevt(): + from sympy.functions.special.polynomials import chebyshevt + assert _test_args(chebyshevt(x, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevt_root(): + from sympy.functions.special.polynomials import chebyshevt_root + assert _test_args(chebyshevt_root(3, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevu(): + from sympy.functions.special.polynomials import chebyshevu + assert _test_args(chebyshevu(x, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevu_root(): + from sympy.functions.special.polynomials import chebyshevu_root + assert _test_args(chebyshevu_root(3, 2)) + + +def test_sympy__functions__special__polynomials__hermite(): + from sympy.functions.special.polynomials import hermite + assert _test_args(hermite(x, 2)) + + +def test_sympy__functions__special__polynomials__hermite_prob(): + from sympy.functions.special.polynomials import hermite_prob + assert _test_args(hermite_prob(x, 2)) + + +def test_sympy__functions__special__polynomials__legendre(): + from sympy.functions.special.polynomials import legendre + assert _test_args(legendre(x, 2)) + + +def test_sympy__functions__special__polynomials__assoc_legendre(): + from sympy.functions.special.polynomials import assoc_legendre + assert _test_args(assoc_legendre(x, 0, y)) + + +def test_sympy__functions__special__polynomials__laguerre(): + from sympy.functions.special.polynomials import laguerre + assert _test_args(laguerre(x, 2)) + + +def test_sympy__functions__special__polynomials__assoc_laguerre(): + from sympy.functions.special.polynomials import assoc_laguerre + assert _test_args(assoc_laguerre(x, 0, y)) + + +def test_sympy__functions__special__spherical_harmonics__Ynm(): + from sympy.functions.special.spherical_harmonics import Ynm + assert _test_args(Ynm(1, 1, x, y)) + + +def test_sympy__functions__special__spherical_harmonics__Znm(): + from sympy.functions.special.spherical_harmonics import Znm + assert _test_args(Znm(x, y, 1, 1)) + + +def test_sympy__functions__special__tensor_functions__LeviCivita(): + from sympy.functions.special.tensor_functions import LeviCivita + assert _test_args(LeviCivita(x, y, 2)) + + +def test_sympy__functions__special__tensor_functions__KroneckerDelta(): + from sympy.functions.special.tensor_functions import KroneckerDelta + assert _test_args(KroneckerDelta(x, y)) + + +def test_sympy__functions__special__zeta_functions__dirichlet_eta(): + from sympy.functions.special.zeta_functions import dirichlet_eta + assert _test_args(dirichlet_eta(x)) + + +def test_sympy__functions__special__zeta_functions__riemann_xi(): + from sympy.functions.special.zeta_functions import riemann_xi + assert _test_args(riemann_xi(x)) + + +def test_sympy__functions__special__zeta_functions__zeta(): + from sympy.functions.special.zeta_functions import zeta + assert _test_args(zeta(101)) + + +def test_sympy__functions__special__zeta_functions__lerchphi(): + from sympy.functions.special.zeta_functions import lerchphi + assert _test_args(lerchphi(x, y, z)) + + +def test_sympy__functions__special__zeta_functions__polylog(): + from sympy.functions.special.zeta_functions import polylog + assert _test_args(polylog(x, y)) + + +def test_sympy__functions__special__zeta_functions__stieltjes(): + from sympy.functions.special.zeta_functions import stieltjes + assert _test_args(stieltjes(x, y)) + + +def test_sympy__integrals__integrals__Integral(): + from sympy.integrals.integrals import Integral + assert _test_args(Integral(2, (x, 0, 1))) + + +def test_sympy__integrals__risch__NonElementaryIntegral(): + from sympy.integrals.risch import NonElementaryIntegral + assert _test_args(NonElementaryIntegral(exp(-x**2), x)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__IntegralTransform(): + pass + + +def test_sympy__integrals__transforms__MellinTransform(): + from sympy.integrals.transforms import MellinTransform + assert _test_args(MellinTransform(2, x, y)) + + +def test_sympy__integrals__transforms__InverseMellinTransform(): + from sympy.integrals.transforms import InverseMellinTransform + assert _test_args(InverseMellinTransform(2, x, y, 0, 1)) + + +def test_sympy__integrals__laplace__LaplaceTransform(): + from sympy.integrals.laplace import LaplaceTransform + assert _test_args(LaplaceTransform(2, x, y)) + + +def test_sympy__integrals__laplace__InverseLaplaceTransform(): + from sympy.integrals.laplace import InverseLaplaceTransform + assert _test_args(InverseLaplaceTransform(2, x, y, 0)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__FourierTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseFourierTransform(): + from sympy.integrals.transforms import InverseFourierTransform + assert _test_args(InverseFourierTransform(2, x, y)) + + +def test_sympy__integrals__transforms__FourierTransform(): + from sympy.integrals.transforms import FourierTransform + assert _test_args(FourierTransform(2, x, y)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__SineCosineTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseSineTransform(): + from sympy.integrals.transforms import InverseSineTransform + assert _test_args(InverseSineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__SineTransform(): + from sympy.integrals.transforms import SineTransform + assert _test_args(SineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__InverseCosineTransform(): + from sympy.integrals.transforms import InverseCosineTransform + assert _test_args(InverseCosineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__CosineTransform(): + from sympy.integrals.transforms import CosineTransform + assert _test_args(CosineTransform(2, x, y)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__HankelTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseHankelTransform(): + from sympy.integrals.transforms import InverseHankelTransform + assert _test_args(InverseHankelTransform(2, x, y, 0)) + + +def test_sympy__integrals__transforms__HankelTransform(): + from sympy.integrals.transforms import HankelTransform + assert _test_args(HankelTransform(2, x, y, 0)) + + +def test_sympy__liealgebras__cartan_type__Standard_Cartan(): + from sympy.liealgebras.cartan_type import Standard_Cartan + assert _test_args(Standard_Cartan("A", 2)) + +def test_sympy__liealgebras__weyl_group__WeylGroup(): + from sympy.liealgebras.weyl_group import WeylGroup + assert _test_args(WeylGroup("B4")) + +def test_sympy__liealgebras__root_system__RootSystem(): + from sympy.liealgebras.root_system import RootSystem + assert _test_args(RootSystem("A2")) + +def test_sympy__liealgebras__type_a__TypeA(): + from sympy.liealgebras.type_a import TypeA + assert _test_args(TypeA(2)) + +def test_sympy__liealgebras__type_b__TypeB(): + from sympy.liealgebras.type_b import TypeB + assert _test_args(TypeB(4)) + +def test_sympy__liealgebras__type_c__TypeC(): + from sympy.liealgebras.type_c import TypeC + assert _test_args(TypeC(4)) + +def test_sympy__liealgebras__type_d__TypeD(): + from sympy.liealgebras.type_d import TypeD + assert _test_args(TypeD(4)) + +def test_sympy__liealgebras__type_e__TypeE(): + from sympy.liealgebras.type_e import TypeE + assert _test_args(TypeE(6)) + +def test_sympy__liealgebras__type_f__TypeF(): + from sympy.liealgebras.type_f import TypeF + assert _test_args(TypeF(4)) + +def test_sympy__liealgebras__type_g__TypeG(): + from sympy.liealgebras.type_g import TypeG + assert _test_args(TypeG(2)) + + +def test_sympy__logic__boolalg__And(): + from sympy.logic.boolalg import And + assert _test_args(And(x, y, 1)) + + +@SKIP("abstract class") +def test_sympy__logic__boolalg__Boolean(): + pass + + +def test_sympy__logic__boolalg__BooleanFunction(): + from sympy.logic.boolalg import BooleanFunction + assert _test_args(BooleanFunction(1, 2, 3)) + +@SKIP("abstract class") +def test_sympy__logic__boolalg__BooleanAtom(): + pass + +def test_sympy__logic__boolalg__BooleanTrue(): + from sympy.logic.boolalg import true + assert _test_args(true) + +def test_sympy__logic__boolalg__BooleanFalse(): + from sympy.logic.boolalg import false + assert _test_args(false) + +def test_sympy__logic__boolalg__Equivalent(): + from sympy.logic.boolalg import Equivalent + assert _test_args(Equivalent(x, 2)) + + +def test_sympy__logic__boolalg__ITE(): + from sympy.logic.boolalg import ITE + assert _test_args(ITE(x, y, 1)) + + +def test_sympy__logic__boolalg__Implies(): + from sympy.logic.boolalg import Implies + assert _test_args(Implies(x, y)) + + +def test_sympy__logic__boolalg__Nand(): + from sympy.logic.boolalg import Nand + assert _test_args(Nand(x, y, 1)) + + +def test_sympy__logic__boolalg__Nor(): + from sympy.logic.boolalg import Nor + assert _test_args(Nor(x, y)) + + +def test_sympy__logic__boolalg__Not(): + from sympy.logic.boolalg import Not + assert _test_args(Not(x)) + + +def test_sympy__logic__boolalg__Or(): + from sympy.logic.boolalg import Or + assert _test_args(Or(x, y)) + + +def test_sympy__logic__boolalg__Xor(): + from sympy.logic.boolalg import Xor + assert _test_args(Xor(x, y, 2)) + +def test_sympy__logic__boolalg__Xnor(): + from sympy.logic.boolalg import Xnor + assert _test_args(Xnor(x, y, 2)) + +def test_sympy__logic__boolalg__Exclusive(): + from sympy.logic.boolalg import Exclusive + assert _test_args(Exclusive(x, y, z)) + + +def test_sympy__matrices__matrixbase__DeferredVector(): + from sympy.matrices.matrixbase import DeferredVector + assert _test_args(DeferredVector("X")) + + +@SKIP("abstract class") +def test_sympy__matrices__expressions__matexpr__MatrixBase(): + pass + + +@SKIP("abstract class") +def test_sympy__matrices__immutable__ImmutableRepMatrix(): + pass + + +def test_sympy__matrices__immutable__ImmutableDenseMatrix(): + from sympy.matrices.immutable import ImmutableDenseMatrix + m = ImmutableDenseMatrix([[1, 2], [3, 4]]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableDenseMatrix(1, 1, [1]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableDenseMatrix(2, 2, lambda i, j: 1) + assert m[0, 0] is S.One + m = ImmutableDenseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j)) + assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified + assert _test_args(m) + assert _test_args(Basic(*list(m))) + + +def test_sympy__matrices__immutable__ImmutableSparseMatrix(): + from sympy.matrices.immutable import ImmutableSparseMatrix + m = ImmutableSparseMatrix([[1, 2], [3, 4]]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(1, 1, {(0, 0): 1}) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(1, 1, [1]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(2, 2, lambda i, j: 1) + assert m[0, 0] is S.One + m = ImmutableSparseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j)) + assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified + assert _test_args(m) + assert _test_args(Basic(*list(m))) + + +def test_sympy__matrices__expressions__slice__MatrixSlice(): + from sympy.matrices.expressions.slice import MatrixSlice + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', 4, 4) + assert _test_args(MatrixSlice(X, (0, 2), (0, 2))) + + +def test_sympy__matrices__expressions__applyfunc__ElementwiseApplyFunction(): + from sympy.matrices.expressions.applyfunc import ElementwiseApplyFunction + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol("X", x, x) + func = Lambda(x, x**2) + assert _test_args(ElementwiseApplyFunction(func, X)) + + +def test_sympy__matrices__expressions__blockmatrix__BlockDiagMatrix(): + from sympy.matrices.expressions.blockmatrix import BlockDiagMatrix + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, x) + Y = MatrixSymbol('Y', y, y) + assert _test_args(BlockDiagMatrix(X, Y)) + + +def test_sympy__matrices__expressions__blockmatrix__BlockMatrix(): + from sympy.matrices.expressions.blockmatrix import BlockMatrix + from sympy.matrices.expressions import MatrixSymbol, ZeroMatrix + X = MatrixSymbol('X', x, x) + Y = MatrixSymbol('Y', y, y) + Z = MatrixSymbol('Z', x, y) + O = ZeroMatrix(y, x) + assert _test_args(BlockMatrix([[X, Z], [O, Y]])) + + +def test_sympy__matrices__expressions__inverse__Inverse(): + from sympy.matrices.expressions.inverse import Inverse + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Inverse(MatrixSymbol('A', 3, 3))) + + +def test_sympy__matrices__expressions__matadd__MatAdd(): + from sympy.matrices.expressions.matadd import MatAdd + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(MatAdd(X, Y)) + + +@SKIP("abstract class") +def test_sympy__matrices__expressions__matexpr__MatrixExpr(): + pass + +def test_sympy__matrices__expressions__matexpr__MatrixElement(): + from sympy.matrices.expressions.matexpr import MatrixSymbol, MatrixElement + from sympy.core.singleton import S + assert _test_args(MatrixElement(MatrixSymbol('A', 3, 5), S(2), S(3))) + +def test_sympy__matrices__expressions__matexpr__MatrixSymbol(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(MatrixSymbol('A', 3, 5)) + + +def test_sympy__matrices__expressions__special__OneMatrix(): + from sympy.matrices.expressions.special import OneMatrix + assert _test_args(OneMatrix(3, 5)) + + +def test_sympy__matrices__expressions__special__ZeroMatrix(): + from sympy.matrices.expressions.special import ZeroMatrix + assert _test_args(ZeroMatrix(3, 5)) + + +def test_sympy__matrices__expressions__special__GenericZeroMatrix(): + from sympy.matrices.expressions.special import GenericZeroMatrix + assert _test_args(GenericZeroMatrix()) + + +def test_sympy__matrices__expressions__special__Identity(): + from sympy.matrices.expressions.special import Identity + assert _test_args(Identity(3)) + + +def test_sympy__matrices__expressions__special__GenericIdentity(): + from sympy.matrices.expressions.special import GenericIdentity + assert _test_args(GenericIdentity()) + + +def test_sympy__matrices__expressions__sets__MatrixSet(): + from sympy.matrices.expressions.sets import MatrixSet + from sympy.core.singleton import S + assert _test_args(MatrixSet(2, 2, S.Reals)) + +def test_sympy__matrices__expressions__matmul__MatMul(): + from sympy.matrices.expressions.matmul import MatMul + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', y, x) + assert _test_args(MatMul(X, Y)) + + +def test_sympy__matrices__expressions__dotproduct__DotProduct(): + from sympy.matrices.expressions.dotproduct import DotProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, 1) + Y = MatrixSymbol('Y', x, 1) + assert _test_args(DotProduct(X, Y)) + +def test_sympy__matrices__expressions__diagonal__DiagonalMatrix(): + from sympy.matrices.expressions.diagonal import DiagonalMatrix + from sympy.matrices.expressions import MatrixSymbol + x = MatrixSymbol('x', 10, 1) + assert _test_args(DiagonalMatrix(x)) + +def test_sympy__matrices__expressions__diagonal__DiagonalOf(): + from sympy.matrices.expressions.diagonal import DiagonalOf + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('x', 10, 10) + assert _test_args(DiagonalOf(X)) + +def test_sympy__matrices__expressions__diagonal__DiagMatrix(): + from sympy.matrices.expressions.diagonal import DiagMatrix + from sympy.matrices.expressions import MatrixSymbol + x = MatrixSymbol('x', 10, 1) + assert _test_args(DiagMatrix(x)) + +def test_sympy__matrices__expressions__hadamard__HadamardProduct(): + from sympy.matrices.expressions.hadamard import HadamardProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(HadamardProduct(X, Y)) + +def test_sympy__matrices__expressions__hadamard__HadamardPower(): + from sympy.matrices.expressions.hadamard import HadamardPower + from sympy.matrices.expressions import MatrixSymbol + from sympy.core.symbol import Symbol + X = MatrixSymbol('X', x, y) + n = Symbol("n") + assert _test_args(HadamardPower(X, n)) + +def test_sympy__matrices__expressions__kronecker__KroneckerProduct(): + from sympy.matrices.expressions.kronecker import KroneckerProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(KroneckerProduct(X, Y)) + + +def test_sympy__matrices__expressions__matpow__MatPow(): + from sympy.matrices.expressions.matpow import MatPow + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, x) + assert _test_args(MatPow(X, 2)) + + +def test_sympy__matrices__expressions__transpose__Transpose(): + from sympy.matrices.expressions.transpose import Transpose + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Transpose(MatrixSymbol('A', 3, 5))) + + +def test_sympy__matrices__expressions__adjoint__Adjoint(): + from sympy.matrices.expressions.adjoint import Adjoint + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Adjoint(MatrixSymbol('A', 3, 5))) + + +def test_sympy__matrices__expressions__trace__Trace(): + from sympy.matrices.expressions.trace import Trace + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Trace(MatrixSymbol('A', 3, 3))) + +def test_sympy__matrices__expressions__determinant__Determinant(): + from sympy.matrices.expressions.determinant import Determinant + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Determinant(MatrixSymbol('A', 3, 3))) + +def test_sympy__matrices__expressions__determinant__Permanent(): + from sympy.matrices.expressions.determinant import Permanent + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Permanent(MatrixSymbol('A', 3, 4))) + +def test_sympy__matrices__expressions__funcmatrix__FunctionMatrix(): + from sympy.matrices.expressions.funcmatrix import FunctionMatrix + from sympy.core.symbol import symbols + i, j = symbols('i,j') + assert _test_args(FunctionMatrix(3, 3, Lambda((i, j), i - j) )) + +def test_sympy__matrices__expressions__fourier__DFT(): + from sympy.matrices.expressions.fourier import DFT + from sympy.core.singleton import S + assert _test_args(DFT(S(2))) + +def test_sympy__matrices__expressions__fourier__IDFT(): + from sympy.matrices.expressions.fourier import IDFT + from sympy.core.singleton import S + assert _test_args(IDFT(S(2))) + +from sympy.matrices.expressions import MatrixSymbol +X = MatrixSymbol('X', 10, 10) + +def test_sympy__matrices__expressions__factorizations__LofLU(): + from sympy.matrices.expressions.factorizations import LofLU + assert _test_args(LofLU(X)) + +def test_sympy__matrices__expressions__factorizations__UofLU(): + from sympy.matrices.expressions.factorizations import UofLU + assert _test_args(UofLU(X)) + +def test_sympy__matrices__expressions__factorizations__QofQR(): + from sympy.matrices.expressions.factorizations import QofQR + assert _test_args(QofQR(X)) + +def test_sympy__matrices__expressions__factorizations__RofQR(): + from sympy.matrices.expressions.factorizations import RofQR + assert _test_args(RofQR(X)) + +def test_sympy__matrices__expressions__factorizations__LofCholesky(): + from sympy.matrices.expressions.factorizations import LofCholesky + assert _test_args(LofCholesky(X)) + +def test_sympy__matrices__expressions__factorizations__UofCholesky(): + from sympy.matrices.expressions.factorizations import UofCholesky + assert _test_args(UofCholesky(X)) + +def test_sympy__matrices__expressions__factorizations__EigenVectors(): + from sympy.matrices.expressions.factorizations import EigenVectors + assert _test_args(EigenVectors(X)) + +def test_sympy__matrices__expressions__factorizations__EigenValues(): + from sympy.matrices.expressions.factorizations import EigenValues + assert _test_args(EigenValues(X)) + +def test_sympy__matrices__expressions__factorizations__UofSVD(): + from sympy.matrices.expressions.factorizations import UofSVD + assert _test_args(UofSVD(X)) + +def test_sympy__matrices__expressions__factorizations__VofSVD(): + from sympy.matrices.expressions.factorizations import VofSVD + assert _test_args(VofSVD(X)) + +def test_sympy__matrices__expressions__factorizations__SofSVD(): + from sympy.matrices.expressions.factorizations import SofSVD + assert _test_args(SofSVD(X)) + +@SKIP("abstract class") +def test_sympy__matrices__expressions__factorizations__Factorization(): + pass + +def test_sympy__matrices__expressions__permutation__PermutationMatrix(): + from sympy.combinatorics import Permutation + from sympy.matrices.expressions.permutation import PermutationMatrix + assert _test_args(PermutationMatrix(Permutation([2, 0, 1]))) + +def test_sympy__matrices__expressions__permutation__MatrixPermute(): + from sympy.combinatorics import Permutation + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.matrices.expressions.permutation import MatrixPermute + A = MatrixSymbol('A', 3, 3) + assert _test_args(MatrixPermute(A, Permutation([2, 0, 1]))) + +def test_sympy__matrices__expressions__companion__CompanionMatrix(): + from sympy.core.symbol import Symbol + from sympy.matrices.expressions.companion import CompanionMatrix + from sympy.polys.polytools import Poly + + x = Symbol('x') + p = Poly([1, 2, 3], x) + assert _test_args(CompanionMatrix(p)) + +def test_sympy__physics__vector__frame__CoordinateSym(): + from sympy.physics.vector import CoordinateSym + from sympy.physics.vector import ReferenceFrame + assert _test_args(CoordinateSym('R_x', ReferenceFrame('R'), 0)) + + +@SKIP("abstract class") +def test_sympy__physics__biomechanics__curve__CharacteristicCurveFunction(): + pass + + +def test_sympy__physics__biomechanics__curve__TendonForceLengthDeGroote2016(): + from sympy.physics.biomechanics import TendonForceLengthDeGroote2016 + l_T_tilde, c0, c1, c2, c3 = symbols('l_T_tilde, c0, c1, c2, c3') + assert _test_args(TendonForceLengthDeGroote2016(l_T_tilde, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__TendonForceLengthInverseDeGroote2016(): + from sympy.physics.biomechanics import TendonForceLengthInverseDeGroote2016 + fl_T, c0, c1, c2, c3 = symbols('fl_T, c0, c1, c2, c3') + assert _test_args(TendonForceLengthInverseDeGroote2016(fl_T, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthPassiveDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthPassiveDeGroote2016 + l_M_tilde, c0, c1 = symbols('l_M_tilde, c0, c1') + assert _test_args(FiberForceLengthPassiveDeGroote2016(l_M_tilde, c0, c1)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthPassiveInverseDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthPassiveInverseDeGroote2016 + fl_M_pas, c0, c1 = symbols('fl_M_pas, c0, c1') + assert _test_args(FiberForceLengthPassiveInverseDeGroote2016(fl_M_pas, c0, c1)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthActiveDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthActiveDeGroote2016 + l_M_tilde, c0, c1, c2, c3, c4, c5, c6, c7, c8, c9, c10, c11 = symbols('l_M_tilde, c0:12') + assert _test_args(FiberForceLengthActiveDeGroote2016(l_M_tilde, c0, c1, c2, c3, c4, c5, c6, c7, c8, c9, c10, c11)) + + +def test_sympy__physics__biomechanics__curve__FiberForceVelocityDeGroote2016(): + from sympy.physics.biomechanics import FiberForceVelocityDeGroote2016 + v_M_tilde, c0, c1, c2, c3 = symbols('v_M_tilde, c0, c1, c2, c3') + assert _test_args(FiberForceVelocityDeGroote2016(v_M_tilde, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__FiberForceVelocityInverseDeGroote2016(): + from sympy.physics.biomechanics import FiberForceVelocityInverseDeGroote2016 + fv_M, c0, c1, c2, c3 = symbols('fv_M, c0, c1, c2, c3') + assert _test_args(FiberForceVelocityInverseDeGroote2016(fv_M, c0, c1, c2, c3)) + + +def test_sympy__physics__paulialgebra__Pauli(): + from sympy.physics.paulialgebra import Pauli + assert _test_args(Pauli(1)) + + +def test_sympy__physics__quantum__anticommutator__AntiCommutator(): + from sympy.physics.quantum.anticommutator import AntiCommutator + assert _test_args(AntiCommutator(x, y)) + + +def test_sympy__physics__quantum__cartesian__PositionBra3D(): + from sympy.physics.quantum.cartesian import PositionBra3D + assert _test_args(PositionBra3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PositionKet3D(): + from sympy.physics.quantum.cartesian import PositionKet3D + assert _test_args(PositionKet3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PositionState3D(): + from sympy.physics.quantum.cartesian import PositionState3D + assert _test_args(PositionState3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxBra(): + from sympy.physics.quantum.cartesian import PxBra + assert _test_args(PxBra(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxKet(): + from sympy.physics.quantum.cartesian import PxKet + assert _test_args(PxKet(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxOp(): + from sympy.physics.quantum.cartesian import PxOp + assert _test_args(PxOp(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__XBra(): + from sympy.physics.quantum.cartesian import XBra + assert _test_args(XBra(x)) + + +def test_sympy__physics__quantum__cartesian__XKet(): + from sympy.physics.quantum.cartesian import XKet + assert _test_args(XKet(x)) + + +def test_sympy__physics__quantum__cartesian__XOp(): + from sympy.physics.quantum.cartesian import XOp + assert _test_args(XOp(x)) + + +def test_sympy__physics__quantum__cartesian__YOp(): + from sympy.physics.quantum.cartesian import YOp + assert _test_args(YOp(x)) + + +def test_sympy__physics__quantum__cartesian__ZOp(): + from sympy.physics.quantum.cartesian import ZOp + assert _test_args(ZOp(x)) + + +def test_sympy__physics__quantum__cg__CG(): + from sympy.physics.quantum.cg import CG + from sympy.core.singleton import S + assert _test_args(CG(Rational(3, 2), Rational(3, 2), S.Half, Rational(-1, 2), 1, 1)) + + +def test_sympy__physics__quantum__cg__Wigner3j(): + from sympy.physics.quantum.cg import Wigner3j + assert _test_args(Wigner3j(6, 0, 4, 0, 2, 0)) + + +def test_sympy__physics__quantum__cg__Wigner6j(): + from sympy.physics.quantum.cg import Wigner6j + assert _test_args(Wigner6j(1, 2, 3, 2, 1, 2)) + + +def test_sympy__physics__quantum__cg__Wigner9j(): + from sympy.physics.quantum.cg import Wigner9j + assert _test_args(Wigner9j(2, 1, 1, Rational(3, 2), S.Half, 1, S.Half, S.Half, 0)) + +def test_sympy__physics__quantum__circuitplot__Mz(): + from sympy.physics.quantum.circuitplot import Mz + assert _test_args(Mz(0)) + +def test_sympy__physics__quantum__circuitplot__Mx(): + from sympy.physics.quantum.circuitplot import Mx + assert _test_args(Mx(0)) + +def test_sympy__physics__quantum__commutator__Commutator(): + from sympy.physics.quantum.commutator import Commutator + A, B = symbols('A,B', commutative=False) + assert _test_args(Commutator(A, B)) + + +def test_sympy__physics__quantum__constants__HBar(): + from sympy.physics.quantum.constants import HBar + assert _test_args(HBar()) + + +def test_sympy__physics__quantum__dagger__Dagger(): + from sympy.physics.quantum.dagger import Dagger + from sympy.physics.quantum.state import Ket + assert _test_args(Dagger(Dagger(Ket('psi')))) + + +def test_sympy__physics__quantum__gate__CGate(): + from sympy.physics.quantum.gate import CGate, Gate + assert _test_args(CGate((0, 1), Gate(2))) + + +def test_sympy__physics__quantum__gate__CGateS(): + from sympy.physics.quantum.gate import CGateS, Gate + assert _test_args(CGateS((0, 1), Gate(2))) + + +def test_sympy__physics__quantum__gate__CNotGate(): + from sympy.physics.quantum.gate import CNotGate + assert _test_args(CNotGate(0, 1)) + + +def test_sympy__physics__quantum__gate__Gate(): + from sympy.physics.quantum.gate import Gate + assert _test_args(Gate(0)) + + +def test_sympy__physics__quantum__gate__HadamardGate(): + from sympy.physics.quantum.gate import HadamardGate + assert _test_args(HadamardGate(0)) + + +def test_sympy__physics__quantum__gate__IdentityGate(): + from sympy.physics.quantum.gate import IdentityGate + assert _test_args(IdentityGate(0)) + + +def test_sympy__physics__quantum__gate__OneQubitGate(): + from sympy.physics.quantum.gate import OneQubitGate + assert _test_args(OneQubitGate(0)) + + +def test_sympy__physics__quantum__gate__PhaseGate(): + from sympy.physics.quantum.gate import PhaseGate + assert _test_args(PhaseGate(0)) + + +def test_sympy__physics__quantum__gate__SwapGate(): + from sympy.physics.quantum.gate import SwapGate + assert _test_args(SwapGate(0, 1)) + + +def test_sympy__physics__quantum__gate__TGate(): + from sympy.physics.quantum.gate import TGate + assert _test_args(TGate(0)) + + +def test_sympy__physics__quantum__gate__TwoQubitGate(): + from sympy.physics.quantum.gate import TwoQubitGate + assert _test_args(TwoQubitGate(0)) + + +def test_sympy__physics__quantum__gate__UGate(): + from sympy.physics.quantum.gate import UGate + from sympy.matrices.immutable import ImmutableDenseMatrix + from sympy.core.containers import Tuple + from sympy.core.numbers import Integer + assert _test_args( + UGate(Tuple(Integer(1)), ImmutableDenseMatrix([[1, 0], [0, 2]]))) + + +def test_sympy__physics__quantum__gate__XGate(): + from sympy.physics.quantum.gate import XGate + assert _test_args(XGate(0)) + + +def test_sympy__physics__quantum__gate__YGate(): + from sympy.physics.quantum.gate import YGate + assert _test_args(YGate(0)) + + +def test_sympy__physics__quantum__gate__ZGate(): + from sympy.physics.quantum.gate import ZGate + assert _test_args(ZGate(0)) + + +def test_sympy__physics__quantum__grover__OracleGateFunction(): + from sympy.physics.quantum.grover import OracleGateFunction + @OracleGateFunction + def f(qubit): + return + assert _test_args(f) + +def test_sympy__physics__quantum__grover__OracleGate(): + from sympy.physics.quantum.grover import OracleGate + def f(qubit): + return + assert _test_args(OracleGate(1,f)) + + +def test_sympy__physics__quantum__grover__WGate(): + from sympy.physics.quantum.grover import WGate + assert _test_args(WGate(1)) + + +def test_sympy__physics__quantum__hilbert__ComplexSpace(): + from sympy.physics.quantum.hilbert import ComplexSpace + assert _test_args(ComplexSpace(x)) + + +def test_sympy__physics__quantum__hilbert__DirectSumHilbertSpace(): + from sympy.physics.quantum.hilbert import DirectSumHilbertSpace, ComplexSpace, FockSpace + c = ComplexSpace(2) + f = FockSpace() + assert _test_args(DirectSumHilbertSpace(c, f)) + + +def test_sympy__physics__quantum__hilbert__FockSpace(): + from sympy.physics.quantum.hilbert import FockSpace + assert _test_args(FockSpace()) + + +def test_sympy__physics__quantum__hilbert__HilbertSpace(): + from sympy.physics.quantum.hilbert import HilbertSpace + assert _test_args(HilbertSpace()) + + +def test_sympy__physics__quantum__hilbert__L2(): + from sympy.physics.quantum.hilbert import L2 + from sympy.core.numbers import oo + from sympy.sets.sets import Interval + assert _test_args(L2(Interval(0, oo))) + + +def test_sympy__physics__quantum__hilbert__TensorPowerHilbertSpace(): + from sympy.physics.quantum.hilbert import TensorPowerHilbertSpace, FockSpace + f = FockSpace() + assert _test_args(TensorPowerHilbertSpace(f, 2)) + + +def test_sympy__physics__quantum__hilbert__TensorProductHilbertSpace(): + from sympy.physics.quantum.hilbert import TensorProductHilbertSpace, FockSpace, ComplexSpace + c = ComplexSpace(2) + f = FockSpace() + assert _test_args(TensorProductHilbertSpace(f, c)) + + +def test_sympy__physics__quantum__innerproduct__InnerProduct(): + from sympy.physics.quantum import Bra, Ket, InnerProduct + b = Bra('b') + k = Ket('k') + assert _test_args(InnerProduct(b, k)) + + +def test_sympy__physics__quantum__operator__DifferentialOperator(): + from sympy.physics.quantum.operator import DifferentialOperator + from sympy.core.function import (Derivative, Function) + f = Function('f') + assert _test_args(DifferentialOperator(1/x*Derivative(f(x), x), f(x))) + + +def test_sympy__physics__quantum__operator__HermitianOperator(): + from sympy.physics.quantum.operator import HermitianOperator + assert _test_args(HermitianOperator('H')) + + +def test_sympy__physics__quantum__operator__IdentityOperator(): + with warns_deprecated_sympy(): + from sympy.physics.quantum.operator import IdentityOperator + assert _test_args(IdentityOperator(5)) + + +def test_sympy__physics__quantum__operator__Operator(): + from sympy.physics.quantum.operator import Operator + assert _test_args(Operator('A')) + + +def test_sympy__physics__quantum__operator__OuterProduct(): + from sympy.physics.quantum.operator import OuterProduct + from sympy.physics.quantum import Ket, Bra + b = Bra('b') + k = Ket('k') + assert _test_args(OuterProduct(k, b)) + + +def test_sympy__physics__quantum__operator__UnitaryOperator(): + from sympy.physics.quantum.operator import UnitaryOperator + assert _test_args(UnitaryOperator('U')) + + +def test_sympy__physics__quantum__piab__PIABBra(): + from sympy.physics.quantum.piab import PIABBra + assert _test_args(PIABBra('B')) + + +def test_sympy__physics__quantum__boson__BosonOp(): + from sympy.physics.quantum.boson import BosonOp + assert _test_args(BosonOp('a')) + assert _test_args(BosonOp('a', False)) + + +def test_sympy__physics__quantum__boson__BosonFockKet(): + from sympy.physics.quantum.boson import BosonFockKet + assert _test_args(BosonFockKet(1)) + + +def test_sympy__physics__quantum__boson__BosonFockBra(): + from sympy.physics.quantum.boson import BosonFockBra + assert _test_args(BosonFockBra(1)) + + +def test_sympy__physics__quantum__boson__BosonCoherentKet(): + from sympy.physics.quantum.boson import BosonCoherentKet + assert _test_args(BosonCoherentKet(1)) + + +def test_sympy__physics__quantum__boson__BosonCoherentBra(): + from sympy.physics.quantum.boson import BosonCoherentBra + assert _test_args(BosonCoherentBra(1)) + + +def test_sympy__physics__quantum__fermion__FermionOp(): + from sympy.physics.quantum.fermion import FermionOp + assert _test_args(FermionOp('c')) + assert _test_args(FermionOp('c', False)) + + +def test_sympy__physics__quantum__fermion__FermionFockKet(): + from sympy.physics.quantum.fermion import FermionFockKet + assert _test_args(FermionFockKet(1)) + + +def test_sympy__physics__quantum__fermion__FermionFockBra(): + from sympy.physics.quantum.fermion import FermionFockBra + assert _test_args(FermionFockBra(1)) + + +def test_sympy__physics__quantum__pauli__SigmaOpBase(): + from sympy.physics.quantum.pauli import SigmaOpBase + assert _test_args(SigmaOpBase()) + + +def test_sympy__physics__quantum__pauli__SigmaX(): + from sympy.physics.quantum.pauli import SigmaX + assert _test_args(SigmaX()) + + +def test_sympy__physics__quantum__pauli__SigmaY(): + from sympy.physics.quantum.pauli import SigmaY + assert _test_args(SigmaY()) + + +def test_sympy__physics__quantum__pauli__SigmaZ(): + from sympy.physics.quantum.pauli import SigmaZ + assert _test_args(SigmaZ()) + + +def test_sympy__physics__quantum__pauli__SigmaMinus(): + from sympy.physics.quantum.pauli import SigmaMinus + assert _test_args(SigmaMinus()) + + +def test_sympy__physics__quantum__pauli__SigmaPlus(): + from sympy.physics.quantum.pauli import SigmaPlus + assert _test_args(SigmaPlus()) + + +def test_sympy__physics__quantum__pauli__SigmaZKet(): + from sympy.physics.quantum.pauli import SigmaZKet + assert _test_args(SigmaZKet(0)) + + +def test_sympy__physics__quantum__pauli__SigmaZBra(): + from sympy.physics.quantum.pauli import SigmaZBra + assert _test_args(SigmaZBra(0)) + + +def test_sympy__physics__quantum__piab__PIABHamiltonian(): + from sympy.physics.quantum.piab import PIABHamiltonian + assert _test_args(PIABHamiltonian('P')) + + +def test_sympy__physics__quantum__piab__PIABKet(): + from sympy.physics.quantum.piab import PIABKet + assert _test_args(PIABKet('K')) + + +def test_sympy__physics__quantum__qexpr__QExpr(): + from sympy.physics.quantum.qexpr import QExpr + assert _test_args(QExpr(0)) + + +def test_sympy__physics__quantum__qft__Fourier(): + from sympy.physics.quantum.qft import Fourier + assert _test_args(Fourier(0, 1)) + + +def test_sympy__physics__quantum__qft__IQFT(): + from sympy.physics.quantum.qft import IQFT + assert _test_args(IQFT(0, 1)) + + +def test_sympy__physics__quantum__qft__QFT(): + from sympy.physics.quantum.qft import QFT + assert _test_args(QFT(0, 1)) + + +def test_sympy__physics__quantum__qft__RkGate(): + from sympy.physics.quantum.qft import RkGate + assert _test_args(RkGate(0, 1)) + + +def test_sympy__physics__quantum__qubit__IntQubit(): + from sympy.physics.quantum.qubit import IntQubit + assert _test_args(IntQubit(0)) + + +def test_sympy__physics__quantum__qubit__IntQubitBra(): + from sympy.physics.quantum.qubit import IntQubitBra + assert _test_args(IntQubitBra(0)) + + +def test_sympy__physics__quantum__qubit__IntQubitState(): + from sympy.physics.quantum.qubit import IntQubitState, QubitState + assert _test_args(IntQubitState(QubitState(0, 1))) + + +def test_sympy__physics__quantum__qubit__Qubit(): + from sympy.physics.quantum.qubit import Qubit + assert _test_args(Qubit(0, 0, 0)) + + +def test_sympy__physics__quantum__qubit__QubitBra(): + from sympy.physics.quantum.qubit import QubitBra + assert _test_args(QubitBra('1', 0)) + + +def test_sympy__physics__quantum__qubit__QubitState(): + from sympy.physics.quantum.qubit import QubitState + assert _test_args(QubitState(0, 1)) + + +def test_sympy__physics__quantum__density__Density(): + from sympy.physics.quantum.density import Density + from sympy.physics.quantum.state import Ket + assert _test_args(Density([Ket(0), 0.5], [Ket(1), 0.5])) + + +@SKIP("TODO: sympy.physics.quantum.shor: Cmod Not Implemented") +def test_sympy__physics__quantum__shor__CMod(): + from sympy.physics.quantum.shor import CMod + assert _test_args(CMod()) + + +def test_sympy__physics__quantum__spin__CoupledSpinState(): + from sympy.physics.quantum.spin import CoupledSpinState + assert _test_args(CoupledSpinState(1, 0, (1, 1))) + assert _test_args(CoupledSpinState(1, 0, (1, S.Half, S.Half))) + assert _test_args(CoupledSpinState( + 1, 0, (1, S.Half, S.Half), ((2, 3, S.Half), (1, 2, 1)) )) + j, m, j1, j2, j3, j12, x = symbols('j m j1:4 j12 x') + assert CoupledSpinState( + j, m, (j1, j2, j3)).subs(j2, x) == CoupledSpinState(j, m, (j1, x, j3)) + assert CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, j12), (1, 2, j)) ).subs(j12, x) == \ + CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, x), (1, 2, j)) ) + + +def test_sympy__physics__quantum__spin__J2Op(): + from sympy.physics.quantum.spin import J2Op + assert _test_args(J2Op('J')) + + +def test_sympy__physics__quantum__spin__JminusOp(): + from sympy.physics.quantum.spin import JminusOp + assert _test_args(JminusOp('J')) + + +def test_sympy__physics__quantum__spin__JplusOp(): + from sympy.physics.quantum.spin import JplusOp + assert _test_args(JplusOp('J')) + + +def test_sympy__physics__quantum__spin__JxBra(): + from sympy.physics.quantum.spin import JxBra + assert _test_args(JxBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JxBraCoupled(): + from sympy.physics.quantum.spin import JxBraCoupled + assert _test_args(JxBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JxKet(): + from sympy.physics.quantum.spin import JxKet + assert _test_args(JxKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JxKetCoupled(): + from sympy.physics.quantum.spin import JxKetCoupled + assert _test_args(JxKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JxOp(): + from sympy.physics.quantum.spin import JxOp + assert _test_args(JxOp('J')) + + +def test_sympy__physics__quantum__spin__JyBra(): + from sympy.physics.quantum.spin import JyBra + assert _test_args(JyBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JyBraCoupled(): + from sympy.physics.quantum.spin import JyBraCoupled + assert _test_args(JyBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JyKet(): + from sympy.physics.quantum.spin import JyKet + assert _test_args(JyKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JyKetCoupled(): + from sympy.physics.quantum.spin import JyKetCoupled + assert _test_args(JyKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JyOp(): + from sympy.physics.quantum.spin import JyOp + assert _test_args(JyOp('J')) + + +def test_sympy__physics__quantum__spin__JzBra(): + from sympy.physics.quantum.spin import JzBra + assert _test_args(JzBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JzBraCoupled(): + from sympy.physics.quantum.spin import JzBraCoupled + assert _test_args(JzBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JzKet(): + from sympy.physics.quantum.spin import JzKet + assert _test_args(JzKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JzKetCoupled(): + from sympy.physics.quantum.spin import JzKetCoupled + assert _test_args(JzKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JzOp(): + from sympy.physics.quantum.spin import JzOp + assert _test_args(JzOp('J')) + + +def test_sympy__physics__quantum__spin__Rotation(): + from sympy.physics.quantum.spin import Rotation + assert _test_args(Rotation(pi, 0, pi/2)) + + +def test_sympy__physics__quantum__spin__SpinState(): + from sympy.physics.quantum.spin import SpinState + assert _test_args(SpinState(1, 0)) + + +def test_sympy__physics__quantum__spin__WignerD(): + from sympy.physics.quantum.spin import WignerD + assert _test_args(WignerD(0, 1, 2, 3, 4, 5)) + + +def test_sympy__physics__quantum__state__Bra(): + from sympy.physics.quantum.state import Bra + assert _test_args(Bra(0)) + + +def test_sympy__physics__quantum__state__BraBase(): + from sympy.physics.quantum.state import BraBase + assert _test_args(BraBase(0)) + + +def test_sympy__physics__quantum__state__Ket(): + from sympy.physics.quantum.state import Ket + assert _test_args(Ket(0)) + + +def test_sympy__physics__quantum__state__KetBase(): + from sympy.physics.quantum.state import KetBase + assert _test_args(KetBase(0)) + + +def test_sympy__physics__quantum__state__State(): + from sympy.physics.quantum.state import State + assert _test_args(State(0)) + + +def test_sympy__physics__quantum__state__StateBase(): + from sympy.physics.quantum.state import StateBase + assert _test_args(StateBase(0)) + + +def test_sympy__physics__quantum__state__OrthogonalBra(): + from sympy.physics.quantum.state import OrthogonalBra + assert _test_args(OrthogonalBra(0)) + + +def test_sympy__physics__quantum__state__OrthogonalKet(): + from sympy.physics.quantum.state import OrthogonalKet + assert _test_args(OrthogonalKet(0)) + + +def test_sympy__physics__quantum__state__OrthogonalState(): + from sympy.physics.quantum.state import OrthogonalState + assert _test_args(OrthogonalState(0)) + + +def test_sympy__physics__quantum__state__TimeDepBra(): + from sympy.physics.quantum.state import TimeDepBra + assert _test_args(TimeDepBra('psi', 't')) + + +def test_sympy__physics__quantum__state__TimeDepKet(): + from sympy.physics.quantum.state import TimeDepKet + assert _test_args(TimeDepKet('psi', 't')) + + +def test_sympy__physics__quantum__state__TimeDepState(): + from sympy.physics.quantum.state import TimeDepState + assert _test_args(TimeDepState('psi', 't')) + + +def test_sympy__physics__quantum__state__Wavefunction(): + from sympy.physics.quantum.state import Wavefunction + from sympy.functions import sin + from sympy.functions.elementary.piecewise import Piecewise + n = 1 + L = 1 + g = Piecewise((0, x < 0), (0, x > L), (sqrt(2//L)*sin(n*pi*x/L), True)) + assert _test_args(Wavefunction(g, x)) + + +def test_sympy__physics__quantum__tensorproduct__TensorProduct(): + from sympy.physics.quantum.tensorproduct import TensorProduct + x, y = symbols("x y", commutative=False) + assert _test_args(TensorProduct(x, y)) + + +def test_sympy__physics__quantum__identitysearch__GateIdentity(): + from sympy.physics.quantum.gate import X + from sympy.physics.quantum.identitysearch import GateIdentity + assert _test_args(GateIdentity(X(0), X(0))) + + +def test_sympy__physics__quantum__sho1d__SHOOp(): + from sympy.physics.quantum.sho1d import SHOOp + assert _test_args(SHOOp('a')) + + +def test_sympy__physics__quantum__sho1d__RaisingOp(): + from sympy.physics.quantum.sho1d import RaisingOp + assert _test_args(RaisingOp('a')) + + +def test_sympy__physics__quantum__sho1d__LoweringOp(): + from sympy.physics.quantum.sho1d import LoweringOp + assert _test_args(LoweringOp('a')) + + +def test_sympy__physics__quantum__sho1d__NumberOp(): + from sympy.physics.quantum.sho1d import NumberOp + assert _test_args(NumberOp('N')) + + +def test_sympy__physics__quantum__sho1d__Hamiltonian(): + from sympy.physics.quantum.sho1d import Hamiltonian + assert _test_args(Hamiltonian('H')) + + +def test_sympy__physics__quantum__sho1d__SHOState(): + from sympy.physics.quantum.sho1d import SHOState + assert _test_args(SHOState(0)) + + +def test_sympy__physics__quantum__sho1d__SHOKet(): + from sympy.physics.quantum.sho1d import SHOKet + assert _test_args(SHOKet(0)) + + +def test_sympy__physics__quantum__sho1d__SHOBra(): + from sympy.physics.quantum.sho1d import SHOBra + assert _test_args(SHOBra(0)) + + +def test_sympy__physics__secondquant__AnnihilateBoson(): + from sympy.physics.secondquant import AnnihilateBoson + assert _test_args(AnnihilateBoson(0)) + + +def test_sympy__physics__secondquant__AnnihilateFermion(): + from sympy.physics.secondquant import AnnihilateFermion + assert _test_args(AnnihilateFermion(0)) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__Annihilator(): + pass + + +def test_sympy__physics__secondquant__AntiSymmetricTensor(): + from sympy.physics.secondquant import AntiSymmetricTensor + i, j = symbols('i j', below_fermi=True) + a, b = symbols('a b', above_fermi=True) + assert _test_args(AntiSymmetricTensor('v', (a, i), (b, j))) + + +def test_sympy__physics__secondquant__BosonState(): + from sympy.physics.secondquant import BosonState + assert _test_args(BosonState((0, 1))) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__BosonicOperator(): + pass + + +def test_sympy__physics__secondquant__Commutator(): + from sympy.physics.secondquant import Commutator + x, y = symbols('x y', commutative=False) + assert _test_args(Commutator(x, y)) + + +def test_sympy__physics__secondquant__CreateBoson(): + from sympy.physics.secondquant import CreateBoson + assert _test_args(CreateBoson(0)) + + +def test_sympy__physics__secondquant__CreateFermion(): + from sympy.physics.secondquant import CreateFermion + assert _test_args(CreateFermion(0)) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__Creator(): + pass + + +def test_sympy__physics__secondquant__Dagger(): + from sympy.physics.secondquant import Dagger + assert _test_args(Dagger(x)) + + +def test_sympy__physics__secondquant__FermionState(): + from sympy.physics.secondquant import FermionState + assert _test_args(FermionState((0, 1))) + + +def test_sympy__physics__secondquant__FermionicOperator(): + from sympy.physics.secondquant import FermionicOperator + assert _test_args(FermionicOperator(0)) + + +def test_sympy__physics__secondquant__FockState(): + from sympy.physics.secondquant import FockState + assert _test_args(FockState((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBosonBra(): + from sympy.physics.secondquant import FockStateBosonBra + assert _test_args(FockStateBosonBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBosonKet(): + from sympy.physics.secondquant import FockStateBosonKet + assert _test_args(FockStateBosonKet((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBra(): + from sympy.physics.secondquant import FockStateBra + assert _test_args(FockStateBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateFermionBra(): + from sympy.physics.secondquant import FockStateFermionBra + assert _test_args(FockStateFermionBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateFermionKet(): + from sympy.physics.secondquant import FockStateFermionKet + assert _test_args(FockStateFermionKet((0, 1))) + + +def test_sympy__physics__secondquant__FockStateKet(): + from sympy.physics.secondquant import FockStateKet + assert _test_args(FockStateKet((0, 1))) + + +def test_sympy__physics__secondquant__InnerProduct(): + from sympy.physics.secondquant import InnerProduct + from sympy.physics.secondquant import FockStateKet, FockStateBra + assert _test_args(InnerProduct(FockStateBra((0, 1)), FockStateKet((0, 1)))) + + +def test_sympy__physics__secondquant__NO(): + from sympy.physics.secondquant import NO, F, Fd + assert _test_args(NO(Fd(x)*F(y))) + + +def test_sympy__physics__secondquant__PermutationOperator(): + from sympy.physics.secondquant import PermutationOperator + assert _test_args(PermutationOperator(0, 1)) + + +def test_sympy__physics__secondquant__SqOperator(): + from sympy.physics.secondquant import SqOperator + assert _test_args(SqOperator(0)) + + +def test_sympy__physics__secondquant__TensorSymbol(): + from sympy.physics.secondquant import TensorSymbol + assert _test_args(TensorSymbol(x)) + + +def test_sympy__physics__control__lti__LinearTimeInvariant(): + # Direct instances of LinearTimeInvariant class are not allowed. + # func(*args) tests for its derived classes (TransferFunction, + # Series, Parallel and TransferFunctionMatrix) should pass. + pass + + +def test_sympy__physics__control__lti__SISOLinearTimeInvariant(): + # Direct instances of SISOLinearTimeInvariant class are not allowed. + pass + + +def test_sympy__physics__control__lti__MIMOLinearTimeInvariant(): + # Direct instances of MIMOLinearTimeInvariant class are not allowed. + pass + + +def test_sympy__physics__control__lti__TransferFunction(): + from sympy.physics.control.lti import TransferFunction + assert _test_args(TransferFunction(2, 3, x)) + + +def _test_args_PIDController(obj): + from sympy.physics.control.lti import PIDController + if isinstance(obj, PIDController): + kp, ki, kd, tf = obj.kp, obj.ki, obj.kd, obj.tf + recreated_pid = PIDController(kp, ki, kd, tf, s) + return recreated_pid == obj + return False + + +def test_sympy__physics__control__lti__PIDController(): + from sympy.physics.control.lti import PIDController + kp, ki, kd, tf = 1, 0.1, 0.01, 0 + assert _test_args_PIDController(PIDController(kp, ki, kd, tf, s)) + + +def test_sympy__physics__control__lti__Series(): + from sympy.physics.control import Series, TransferFunction + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Series(tf1, tf2)) + + +def test_sympy__physics__control__lti__MIMOSeries(): + from sympy.physics.control import MIMOSeries, TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_3 = TransferFunctionMatrix([[tf1], [tf2]]) + assert _test_args(MIMOSeries(tfm_3, tfm_2, tfm_1)) + + +def test_sympy__physics__control__lti__Parallel(): + from sympy.physics.control import Parallel, TransferFunction + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Parallel(tf1, tf2)) + + +def test_sympy__physics__control__lti__MIMOParallel(): + from sympy.physics.control import MIMOParallel, TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + assert _test_args(MIMOParallel(tfm_1, tfm_2)) + + +def test_sympy__physics__control__lti__Feedback(): + from sympy.physics.control import TransferFunction, Feedback + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Feedback(tf1, tf2)) + assert _test_args(Feedback(tf1, tf2, 1)) + + +def test_sympy__physics__control__lti__MIMOFeedback(): + from sympy.physics.control import TransferFunction, MIMOFeedback, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + tfm_2 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + assert _test_args(MIMOFeedback(tfm_1, tfm_2)) + assert _test_args(MIMOFeedback(tfm_1, tfm_2, 1)) + + +def test_sympy__physics__control__lti__TransferFunctionMatrix(): + from sympy.physics.control import TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(TransferFunctionMatrix([[tf1, tf2]])) + + +def test_sympy__physics__control__lti__StateSpace(): + from sympy.matrices.dense import Matrix + from sympy.physics.control import StateSpace + A = Matrix([[-5, -1], [3, -1]]) + B = Matrix([2, 5]) + C = Matrix([[1, 2]]) + D = Matrix([0]) + assert _test_args(StateSpace(A, B, C, D)) + + +def test_sympy__physics__units__dimensions__Dimension(): + from sympy.physics.units.dimensions import Dimension + assert _test_args(Dimension("length", "L")) + + +def test_sympy__physics__units__dimensions__DimensionSystem(): + from sympy.physics.units.dimensions import DimensionSystem + from sympy.physics.units.definitions.dimension_definitions import length, time, velocity + assert _test_args(DimensionSystem((length, time), (velocity,))) + + +def test_sympy__physics__units__quantities__Quantity(): + from sympy.physics.units.quantities import Quantity + assert _test_args(Quantity("dam")) + + +def test_sympy__physics__units__quantities__PhysicalConstant(): + from sympy.physics.units.quantities import PhysicalConstant + assert _test_args(PhysicalConstant("foo")) + + +def test_sympy__physics__units__prefixes__Prefix(): + from sympy.physics.units.prefixes import Prefix + assert _test_args(Prefix('kilo', 'k', 3)) + + +def test_sympy__core__numbers__AlgebraicNumber(): + from sympy.core.numbers import AlgebraicNumber + assert _test_args(AlgebraicNumber(sqrt(2), [1, 2, 3])) + + +def test_sympy__polys__polytools__GroebnerBasis(): + from sympy.polys.polytools import GroebnerBasis + assert _test_args(GroebnerBasis([x, y, z], x, y, z)) + + +def test_sympy__polys__polytools__Poly(): + from sympy.polys.polytools import Poly + assert _test_args(Poly(2, x, y)) + + +def test_sympy__polys__polytools__PurePoly(): + from sympy.polys.polytools import PurePoly + assert _test_args(PurePoly(2, x, y)) + + +@SKIP('abstract class') +def test_sympy__polys__rootoftools__RootOf(): + pass + + +def test_sympy__polys__rootoftools__ComplexRootOf(): + from sympy.polys.rootoftools import ComplexRootOf + assert _test_args(ComplexRootOf(x**3 + x + 1, 0)) + + +def test_sympy__polys__rootoftools__RootSum(): + from sympy.polys.rootoftools import RootSum + assert _test_args(RootSum(x**3 + x + 1, sin)) + + +def test_sympy__series__limits__Limit(): + from sympy.series.limits import Limit + assert _test_args(Limit(x, x, 0, dir='-')) + + +def test_sympy__series__order__Order(): + from sympy.series.order import Order + assert _test_args(Order(1, x, y)) + + +@SKIP('Abstract Class') +def test_sympy__series__sequences__SeqBase(): + pass + + +def test_sympy__series__sequences__EmptySequence(): + # Need to import the instance from series not the class from + # series.sequence + from sympy.series import EmptySequence + assert _test_args(EmptySequence) + + +@SKIP('Abstract Class') +def test_sympy__series__sequences__SeqExpr(): + pass + + +def test_sympy__series__sequences__SeqPer(): + from sympy.series.sequences import SeqPer + assert _test_args(SeqPer((1, 2, 3), (0, 10))) + + +def test_sympy__series__sequences__SeqFormula(): + from sympy.series.sequences import SeqFormula + assert _test_args(SeqFormula(x**2, (0, 10))) + + +def test_sympy__series__sequences__RecursiveSeq(): + from sympy.series.sequences import RecursiveSeq + y = Function("y") + n = symbols("n") + assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n, (0, 1))) + assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n)) + + +def test_sympy__series__sequences__SeqExprOp(): + from sympy.series.sequences import SeqExprOp, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqExprOp(s1, s2)) + + +def test_sympy__series__sequences__SeqAdd(): + from sympy.series.sequences import SeqAdd, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqAdd(s1, s2)) + + +def test_sympy__series__sequences__SeqMul(): + from sympy.series.sequences import SeqMul, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqMul(s1, s2)) + + +@SKIP('Abstract Class') +def test_sympy__series__series_class__SeriesBase(): + pass + + +def test_sympy__series__fourier__FourierSeries(): + from sympy.series.fourier import fourier_series + assert _test_args(fourier_series(x, (x, -pi, pi))) + +def test_sympy__series__fourier__FiniteFourierSeries(): + from sympy.series.fourier import fourier_series + assert _test_args(fourier_series(sin(pi*x), (x, -1, 1))) + + +def test_sympy__series__formal__FormalPowerSeries(): + from sympy.series.formal import fps + assert _test_args(fps(log(1 + x), x)) + + +def test_sympy__series__formal__Coeff(): + from sympy.series.formal import fps + assert _test_args(fps(x**2 + x + 1, x)) + + +@SKIP('Abstract Class') +def test_sympy__series__formal__FiniteFormalPowerSeries(): + pass + + +def test_sympy__series__formal__FormalPowerSeriesProduct(): + from sympy.series.formal import fps + f1, f2 = fps(sin(x)), fps(exp(x)) + assert _test_args(f1.product(f2, x)) + + +def test_sympy__series__formal__FormalPowerSeriesCompose(): + from sympy.series.formal import fps + f1, f2 = fps(exp(x)), fps(sin(x)) + assert _test_args(f1.compose(f2, x)) + + +def test_sympy__series__formal__FormalPowerSeriesInverse(): + from sympy.series.formal import fps + f1 = fps(exp(x)) + assert _test_args(f1.inverse(x)) + + +def test_sympy__simplify__hyperexpand__Hyper_Function(): + from sympy.simplify.hyperexpand import Hyper_Function + assert _test_args(Hyper_Function([2], [1])) + + +def test_sympy__simplify__hyperexpand__G_Function(): + from sympy.simplify.hyperexpand import G_Function + assert _test_args(G_Function([2], [1], [], [])) + + +@SKIP("abstract class") +def test_sympy__tensor__array__ndim_array__ImmutableNDimArray(): + pass + + +def test_sympy__tensor__array__dense_ndim_array__ImmutableDenseNDimArray(): + from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray + densarr = ImmutableDenseNDimArray(range(10, 34), (2, 3, 4)) + assert _test_args(densarr) + + +def test_sympy__tensor__array__sparse_ndim_array__ImmutableSparseNDimArray(): + from sympy.tensor.array.sparse_ndim_array import ImmutableSparseNDimArray + sparr = ImmutableSparseNDimArray(range(10, 34), (2, 3, 4)) + assert _test_args(sparr) + + +def test_sympy__tensor__array__array_comprehension__ArrayComprehension(): + from sympy.tensor.array.array_comprehension import ArrayComprehension + arrcom = ArrayComprehension(x, (x, 1, 5)) + assert _test_args(arrcom) + +def test_sympy__tensor__array__array_comprehension__ArrayComprehensionMap(): + from sympy.tensor.array.array_comprehension import ArrayComprehensionMap + arrcomma = ArrayComprehensionMap(lambda: 0, (x, 1, 5)) + assert _test_args(arrcomma) + + +def test_sympy__tensor__array__array_derivatives__ArrayDerivative(): + from sympy.tensor.array.array_derivatives import ArrayDerivative + A = MatrixSymbol("A", 2, 2) + arrder = ArrayDerivative(A, A, evaluate=False) + assert _test_args(arrder) + +def test_sympy__tensor__array__expressions__array_expressions__ArraySymbol(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol + m, n, k = symbols("m n k") + array = ArraySymbol("A", (m, n, k, 2)) + assert _test_args(array) + +def test_sympy__tensor__array__expressions__array_expressions__ArrayElement(): + from sympy.tensor.array.expressions.array_expressions import ArrayElement + m, n, k = symbols("m n k") + ae = ArrayElement("A", (m, n, k, 2)) + assert _test_args(ae) + +def test_sympy__tensor__array__expressions__array_expressions__ZeroArray(): + from sympy.tensor.array.expressions.array_expressions import ZeroArray + m, n, k = symbols("m n k") + za = ZeroArray(m, n, k, 2) + assert _test_args(za) + +def test_sympy__tensor__array__expressions__array_expressions__OneArray(): + from sympy.tensor.array.expressions.array_expressions import OneArray + m, n, k = symbols("m n k") + za = OneArray(m, n, k, 2) + assert _test_args(za) + +def test_sympy__tensor__functions__TensorProduct(): + from sympy.tensor.functions import TensorProduct + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + tp = TensorProduct(A, B) + assert _test_args(tp) + + +def test_sympy__tensor__indexed__Idx(): + from sympy.tensor.indexed import Idx + assert _test_args(Idx('test')) + assert _test_args(Idx('test', (0, 10))) + assert _test_args(Idx('test', 2)) + assert _test_args(Idx('test', x)) + + +def test_sympy__tensor__indexed__Indexed(): + from sympy.tensor.indexed import Indexed, Idx + assert _test_args(Indexed('A', Idx('i'), Idx('j'))) + + +def test_sympy__tensor__indexed__IndexedBase(): + from sympy.tensor.indexed import IndexedBase + assert _test_args(IndexedBase('A', shape=(x, y))) + assert _test_args(IndexedBase('A', 1)) + assert _test_args(IndexedBase('A')[0, 1]) + + +def test_sympy__tensor__tensor__TensorIndexType(): + from sympy.tensor.tensor import TensorIndexType + assert _test_args(TensorIndexType('Lorentz')) + + +@SKIP("deprecated class") +def test_sympy__tensor__tensor__TensorType(): + pass + + +def test_sympy__tensor__tensor__TensorSymmetry(): + from sympy.tensor.tensor import TensorSymmetry, get_symmetric_group_sgs + assert _test_args(TensorSymmetry(get_symmetric_group_sgs(2))) + + +def test_sympy__tensor__tensor__TensorHead(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, TensorHead + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + assert _test_args(TensorHead('p', [Lorentz], sym, 0)) + + +def test_sympy__tensor__tensor__TensorIndex(): + from sympy.tensor.tensor import TensorIndexType, TensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + assert _test_args(TensorIndex('i', Lorentz)) + +@SKIP("abstract class") +def test_sympy__tensor__tensor__TensExpr(): + pass + +def test_sympy__tensor__tensor__TensAdd(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensAdd, tensor_heads + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p, q = tensor_heads('p,q', [Lorentz], sym) + t1 = p(a) + t2 = q(a) + assert _test_args(TensAdd(t1, t2)) + + +def test_sympy__tensor__tensor__Tensor(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensorHead + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p = TensorHead('p', [Lorentz], sym) + assert _test_args(p(a)) + + +def test_sympy__tensor__tensor__TensMul(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, tensor_heads + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p, q = tensor_heads('p, q', [Lorentz], sym) + assert _test_args(3*p(a)*q(b)) + + +def test_sympy__tensor__tensor__TensorElement(): + from sympy.tensor.tensor import TensorIndexType, TensorHead, TensorElement + L = TensorIndexType("L") + A = TensorHead("A", [L, L]) + telem = TensorElement(A(x, y), {x: 1}) + assert _test_args(telem) + +def test_sympy__tensor__tensor__WildTensor(): + from sympy.tensor.tensor import TensorIndexType, WildTensorHead, TensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a = TensorIndex('a', Lorentz) + p = WildTensorHead('p') + assert _test_args(p(a)) + +def test_sympy__tensor__tensor__WildTensorHead(): + from sympy.tensor.tensor import WildTensorHead + assert _test_args(WildTensorHead('p')) + +def test_sympy__tensor__tensor__WildTensorIndex(): + from sympy.tensor.tensor import TensorIndexType, WildTensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + assert _test_args(WildTensorIndex('i', Lorentz)) + +def test_sympy__tensor__toperators__PartialDerivative(): + from sympy.tensor.tensor import TensorIndexType, tensor_indices, TensorHead + from sympy.tensor.toperators import PartialDerivative + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + A = TensorHead("A", [Lorentz]) + assert _test_args(PartialDerivative(A(a), A(b))) + + +def test_as_coeff_add(): + assert (7, (3*x, 4*x**2)) == (7 + 3*x + 4*x**2).as_coeff_add() + + +def test_sympy__geometry__curve__Curve(): + from sympy.geometry.curve import Curve + assert _test_args(Curve((x, 1), (x, 0, 1))) + + +def test_sympy__geometry__point__Point(): + from sympy.geometry.point import Point + assert _test_args(Point(0, 1)) + + +def test_sympy__geometry__point__Point2D(): + from sympy.geometry.point import Point2D + assert _test_args(Point2D(0, 1)) + + +def test_sympy__geometry__point__Point3D(): + from sympy.geometry.point import Point3D + assert _test_args(Point3D(0, 1, 2)) + + +def test_sympy__geometry__ellipse__Ellipse(): + from sympy.geometry.ellipse import Ellipse + assert _test_args(Ellipse((0, 1), 2, 3)) + + +def test_sympy__geometry__ellipse__Circle(): + from sympy.geometry.ellipse import Circle + assert _test_args(Circle((0, 1), 2)) + + +def test_sympy__geometry__parabola__Parabola(): + from sympy.geometry.parabola import Parabola + from sympy.geometry.line import Line + assert _test_args(Parabola((0, 0), Line((2, 3), (4, 3)))) + + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity(): + pass + + +def test_sympy__geometry__line__Line(): + from sympy.geometry.line import Line + assert _test_args(Line((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Ray(): + from sympy.geometry.line import Ray + assert _test_args(Ray((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Segment(): + from sympy.geometry.line import Segment + assert _test_args(Segment((0, 1), (2, 3))) + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity2D(): + pass + + +def test_sympy__geometry__line__Line2D(): + from sympy.geometry.line import Line2D + assert _test_args(Line2D((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Ray2D(): + from sympy.geometry.line import Ray2D + assert _test_args(Ray2D((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Segment2D(): + from sympy.geometry.line import Segment2D + assert _test_args(Segment2D((0, 1), (2, 3))) + + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity3D(): + pass + + +def test_sympy__geometry__line__Line3D(): + from sympy.geometry.line import Line3D + assert _test_args(Line3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__line__Segment3D(): + from sympy.geometry.line import Segment3D + assert _test_args(Segment3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__line__Ray3D(): + from sympy.geometry.line import Ray3D + assert _test_args(Ray3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__plane__Plane(): + from sympy.geometry.plane import Plane + assert _test_args(Plane((1, 1, 1), (-3, 4, -2), (1, 2, 3))) + + +def test_sympy__geometry__polygon__Polygon(): + from sympy.geometry.polygon import Polygon + assert _test_args(Polygon((0, 1), (2, 3), (4, 5), (6, 7))) + + +def test_sympy__geometry__polygon__RegularPolygon(): + from sympy.geometry.polygon import RegularPolygon + assert _test_args(RegularPolygon((0, 1), 2, 3, 4)) + + +def test_sympy__geometry__polygon__Triangle(): + from sympy.geometry.polygon import Triangle + assert _test_args(Triangle((0, 1), (2, 3), (4, 5))) + + +def test_sympy__geometry__entity__GeometryEntity(): + from sympy.geometry.entity import GeometryEntity + from sympy.geometry.point import Point + assert _test_args(GeometryEntity(Point(1, 0), 1, [1, 2])) + +@SKIP("abstract class") +def test_sympy__geometry__entity__GeometrySet(): + pass + +def test_sympy__diffgeom__diffgeom__Manifold(): + from sympy.diffgeom import Manifold + assert _test_args(Manifold('name', 3)) + + +def test_sympy__diffgeom__diffgeom__Patch(): + from sympy.diffgeom import Manifold, Patch + assert _test_args(Patch('name', Manifold('name', 3))) + + +def test_sympy__diffgeom__diffgeom__CoordSystem(): + from sympy.diffgeom import Manifold, Patch, CoordSystem + assert _test_args(CoordSystem('name', Patch('name', Manifold('name', 3)))) + assert _test_args(CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c])) + + +def test_sympy__diffgeom__diffgeom__CoordinateSymbol(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, CoordinateSymbol + assert _test_args(CoordinateSymbol(CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]), 0)) + + +def test_sympy__diffgeom__diffgeom__Point(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, Point + assert _test_args(Point( + CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]), [x, y])) + + +def test_sympy__diffgeom__diffgeom__BaseScalarField(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseScalarField(cs, 0)) + + +def test_sympy__diffgeom__diffgeom__BaseVectorField(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseVectorField(cs, 0)) + + +def test_sympy__diffgeom__diffgeom__Differential(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(Differential(BaseScalarField(cs, 0))) + + +def test_sympy__diffgeom__diffgeom__Commutator(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, Commutator + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + cs1 = CoordSystem('name1', Patch('name', Manifold('name', 3)), [a, b, c]) + v = BaseVectorField(cs, 0) + v1 = BaseVectorField(cs1, 0) + assert _test_args(Commutator(v, v1)) + + +def test_sympy__diffgeom__diffgeom__TensorProduct(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, TensorProduct + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + assert _test_args(TensorProduct(d, d)) + + +def test_sympy__diffgeom__diffgeom__WedgeProduct(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, WedgeProduct + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + d1 = Differential(BaseScalarField(cs, 1)) + assert _test_args(WedgeProduct(d, d1)) + + +def test_sympy__diffgeom__diffgeom__LieDerivative(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, BaseVectorField, LieDerivative + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + v = BaseVectorField(cs, 0) + assert _test_args(LieDerivative(v, d)) + + +def test_sympy__diffgeom__diffgeom__BaseCovarDerivativeOp(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseCovarDerivativeOp + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseCovarDerivativeOp(cs, 0, [[[0, ]*3, ]*3, ]*3)) + + +def test_sympy__diffgeom__diffgeom__CovarDerivativeOp(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, CovarDerivativeOp + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + v = BaseVectorField(cs, 0) + _test_args(CovarDerivativeOp(v, [[[0, ]*3, ]*3, ]*3)) + + +def test_sympy__categories__baseclasses__Class(): + from sympy.categories.baseclasses import Class + assert _test_args(Class()) + + +def test_sympy__categories__baseclasses__Object(): + from sympy.categories import Object + assert _test_args(Object("A")) + + +@SKIP("abstract class") +def test_sympy__categories__baseclasses__Morphism(): + pass + + +def test_sympy__categories__baseclasses__IdentityMorphism(): + from sympy.categories import Object, IdentityMorphism + assert _test_args(IdentityMorphism(Object("A"))) + + +def test_sympy__categories__baseclasses__NamedMorphism(): + from sympy.categories import Object, NamedMorphism + assert _test_args(NamedMorphism(Object("A"), Object("B"), "f")) + + +def test_sympy__categories__baseclasses__CompositeMorphism(): + from sympy.categories import Object, NamedMorphism, CompositeMorphism + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + assert _test_args(CompositeMorphism(f, g)) + + +def test_sympy__categories__baseclasses__Diagram(): + from sympy.categories import Object, NamedMorphism, Diagram + A = Object("A") + B = Object("B") + f = NamedMorphism(A, B, "f") + d = Diagram([f]) + assert _test_args(d) + + +def test_sympy__categories__baseclasses__Category(): + from sympy.categories import Object, NamedMorphism, Diagram, Category + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + d1 = Diagram([f, g]) + d2 = Diagram([f]) + K = Category("K", commutative_diagrams=[d1, d2]) + assert _test_args(K) + + +def test_sympy__physics__optics__waves__TWave(): + from sympy.physics.optics import TWave + A, f, phi = symbols('A, f, phi') + assert _test_args(TWave(A, f, phi)) + + +def test_sympy__physics__optics__gaussopt__BeamParameter(): + from sympy.physics.optics import BeamParameter + assert _test_args(BeamParameter(530e-9, 1, w=1e-3, n=1)) + + +def test_sympy__physics__optics__medium__Medium(): + from sympy.physics.optics import Medium + assert _test_args(Medium('m')) + + +def test_sympy__physics__optics__medium__MediumN(): + from sympy.physics.optics.medium import Medium + assert _test_args(Medium('m', n=2)) + + +def test_sympy__physics__optics__medium__MediumPP(): + from sympy.physics.optics.medium import Medium + assert _test_args(Medium('m', permittivity=2, permeability=2)) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayContraction(): + from sympy.tensor.array.expressions.array_expressions import ArrayContraction + from sympy.tensor.indexed import IndexedBase + A = symbols("A", cls=IndexedBase) + assert _test_args(ArrayContraction(A, (0, 1))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayDiagonal(): + from sympy.tensor.array.expressions.array_expressions import ArrayDiagonal + from sympy.tensor.indexed import IndexedBase + A = symbols("A", cls=IndexedBase) + assert _test_args(ArrayDiagonal(A, (0, 1))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayTensorProduct(): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + from sympy.tensor.indexed import IndexedBase + A, B = symbols("A B", cls=IndexedBase) + assert _test_args(ArrayTensorProduct(A, B)) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayAdd(): + from sympy.tensor.array.expressions.array_expressions import ArrayAdd + from sympy.tensor.indexed import IndexedBase + A, B = symbols("A B", cls=IndexedBase) + assert _test_args(ArrayAdd(A, B)) + + +def test_sympy__tensor__array__expressions__array_expressions__PermuteDims(): + from sympy.tensor.array.expressions.array_expressions import PermuteDims + A = MatrixSymbol("A", 4, 4) + assert _test_args(PermuteDims(A, (1, 0))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayElementwiseApplyFunc(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol, ArrayElementwiseApplyFunc + A = ArraySymbol("A", (4,)) + assert _test_args(ArrayElementwiseApplyFunc(exp, A)) + + +def test_sympy__tensor__array__expressions__array_expressions__Reshape(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol, Reshape + A = ArraySymbol("A", (4,)) + assert _test_args(Reshape(A, (2, 2))) + + +def test_sympy__codegen__ast__Assignment(): + from sympy.codegen.ast import Assignment + assert _test_args(Assignment(x, y)) + + +def test_sympy__codegen__cfunctions__expm1(): + from sympy.codegen.cfunctions import expm1 + assert _test_args(expm1(x)) + + +def test_sympy__codegen__cfunctions__log1p(): + from sympy.codegen.cfunctions import log1p + assert _test_args(log1p(x)) + + +def test_sympy__codegen__cfunctions__exp2(): + from sympy.codegen.cfunctions import exp2 + assert _test_args(exp2(x)) + + +def test_sympy__codegen__cfunctions__log2(): + from sympy.codegen.cfunctions import log2 + assert _test_args(log2(x)) + + +def test_sympy__codegen__cfunctions__fma(): + from sympy.codegen.cfunctions import fma + assert _test_args(fma(x, y, z)) + + +def test_sympy__codegen__cfunctions__log10(): + from sympy.codegen.cfunctions import log10 + assert _test_args(log10(x)) + + +def test_sympy__codegen__cfunctions__Sqrt(): + from sympy.codegen.cfunctions import Sqrt + assert _test_args(Sqrt(x)) + +def test_sympy__codegen__cfunctions__Cbrt(): + from sympy.codegen.cfunctions import Cbrt + assert _test_args(Cbrt(x)) + +def test_sympy__codegen__cfunctions__hypot(): + from sympy.codegen.cfunctions import hypot + assert _test_args(hypot(x, y)) + + +def test_sympy__codegen__cfunctions__isnan(): + from sympy.codegen.cfunctions import isnan + assert _test_args(isnan(x)) + + +def test_sympy__codegen__cfunctions__isinf(): + from sympy.codegen.cfunctions import isinf + assert _test_args(isinf(x)) + + +def test_sympy__codegen__fnodes__FFunction(): + from sympy.codegen.fnodes import FFunction + assert _test_args(FFunction('f')) + + +def test_sympy__codegen__fnodes__F95Function(): + from sympy.codegen.fnodes import F95Function + assert _test_args(F95Function('f')) + + +def test_sympy__codegen__fnodes__isign(): + from sympy.codegen.fnodes import isign + assert _test_args(isign(1, x)) + + +def test_sympy__codegen__fnodes__dsign(): + from sympy.codegen.fnodes import dsign + assert _test_args(dsign(1, x)) + + +def test_sympy__codegen__fnodes__cmplx(): + from sympy.codegen.fnodes import cmplx + assert _test_args(cmplx(x, y)) + + +def test_sympy__codegen__fnodes__kind(): + from sympy.codegen.fnodes import kind + assert _test_args(kind(x)) + + +def test_sympy__codegen__fnodes__merge(): + from sympy.codegen.fnodes import merge + assert _test_args(merge(1, 2, Eq(x, 0))) + + +def test_sympy__codegen__fnodes___literal(): + from sympy.codegen.fnodes import _literal + assert _test_args(_literal(1)) + + +def test_sympy__codegen__fnodes__literal_sp(): + from sympy.codegen.fnodes import literal_sp + assert _test_args(literal_sp(1)) + + +def test_sympy__codegen__fnodes__literal_dp(): + from sympy.codegen.fnodes import literal_dp + assert _test_args(literal_dp(1)) + + +def test_sympy__codegen__matrix_nodes__MatrixSolve(): + from sympy.matrices import MatrixSymbol + from sympy.codegen.matrix_nodes import MatrixSolve + A = MatrixSymbol('A', 3, 3) + v = MatrixSymbol('x', 3, 1) + assert _test_args(MatrixSolve(A, v)) + + +def test_sympy__printing__rust__TypeCast(): + from sympy.printing.rust import TypeCast + from sympy.codegen.ast import real + assert _test_args(TypeCast(x, real)) + + +def test_sympy__printing__rust__float_floor(): + from sympy.printing.rust import float_floor + assert _test_args(float_floor(x)) + + +def test_sympy__printing__rust__float_ceiling(): + from sympy.printing.rust import float_ceiling + assert _test_args(float_ceiling(x)) + + +def test_sympy__vector__coordsysrect__CoordSys3D(): + from sympy.vector.coordsysrect import CoordSys3D + assert _test_args(CoordSys3D('C')) + + +def test_sympy__vector__point__Point(): + from sympy.vector.point import Point + assert _test_args(Point('P')) + + +def test_sympy__vector__basisdependent__BasisDependent(): + #from sympy.vector.basisdependent import BasisDependent + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentMul(): + #from sympy.vector.basisdependent import BasisDependentMul + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentAdd(): + #from sympy.vector.basisdependent import BasisDependentAdd + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentZero(): + #from sympy.vector.basisdependent import BasisDependentZero + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__vector__BaseVector(): + from sympy.vector.vector import BaseVector + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseVector(0, C, ' ', ' ')) + + +def test_sympy__vector__vector__VectorAdd(): + from sympy.vector.vector import VectorAdd, VectorMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + from sympy.abc import a, b, c, x, y, z + v1 = a*C.i + b*C.j + c*C.k + v2 = x*C.i + y*C.j + z*C.k + assert _test_args(VectorAdd(v1, v2)) + assert _test_args(VectorMul(x, v1)) + + +def test_sympy__vector__vector__VectorMul(): + from sympy.vector.vector import VectorMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + from sympy.abc import a + assert _test_args(VectorMul(a, C.i)) + + +def test_sympy__vector__vector__VectorZero(): + from sympy.vector.vector import VectorZero + assert _test_args(VectorZero()) + + +def test_sympy__vector__vector__Vector(): + #from sympy.vector.vector import Vector + #Vector is never to be initialized using args + pass + + +def test_sympy__vector__vector__Cross(): + from sympy.vector.vector import Cross + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + _test_args(Cross(C.i, C.j)) + + +def test_sympy__vector__vector__Dot(): + from sympy.vector.vector import Dot + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + _test_args(Dot(C.i, C.j)) + + +def test_sympy__vector__dyadic__Dyadic(): + #from sympy.vector.dyadic import Dyadic + #Dyadic is never to be initialized using args + pass + + +def test_sympy__vector__dyadic__BaseDyadic(): + from sympy.vector.dyadic import BaseDyadic + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseDyadic(C.i, C.j)) + + +def test_sympy__vector__dyadic__DyadicMul(): + from sympy.vector.dyadic import BaseDyadic, DyadicMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(DyadicMul(3, BaseDyadic(C.i, C.j))) + + +def test_sympy__vector__dyadic__DyadicAdd(): + from sympy.vector.dyadic import BaseDyadic, DyadicAdd + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(2 * DyadicAdd(BaseDyadic(C.i, C.i), + BaseDyadic(C.i, C.j))) + + +def test_sympy__vector__dyadic__DyadicZero(): + from sympy.vector.dyadic import DyadicZero + assert _test_args(DyadicZero()) + + +def test_sympy__vector__deloperator__Del(): + from sympy.vector.deloperator import Del + assert _test_args(Del()) + + +def test_sympy__vector__implicitregion__ImplicitRegion(): + from sympy.vector.implicitregion import ImplicitRegion + from sympy.abc import x, y + assert _test_args(ImplicitRegion((x, y), y**3 - 4*x)) + + +def test_sympy__vector__integrals__ParametricIntegral(): + from sympy.vector.integrals import ParametricIntegral + from sympy.vector.parametricregion import ParametricRegion + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(ParametricIntegral(C.y*C.i - 10*C.j,\ + ParametricRegion((x, y), (x, 1, 3), (y, -2, 2)))) + +def test_sympy__vector__operators__Curl(): + from sympy.vector.operators import Curl + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Curl(C.i)) + + +def test_sympy__vector__operators__Laplacian(): + from sympy.vector.operators import Laplacian + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Laplacian(C.i)) + + +def test_sympy__vector__operators__Divergence(): + from sympy.vector.operators import Divergence + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Divergence(C.i)) + + +def test_sympy__vector__operators__Gradient(): + from sympy.vector.operators import Gradient + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Gradient(C.x)) + + +def test_sympy__vector__orienters__Orienter(): + #from sympy.vector.orienters import Orienter + #Not to be initialized + pass + + +def test_sympy__vector__orienters__ThreeAngleOrienter(): + #from sympy.vector.orienters import ThreeAngleOrienter + #Not to be initialized + pass + + +def test_sympy__vector__orienters__AxisOrienter(): + from sympy.vector.orienters import AxisOrienter + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(AxisOrienter(x, C.i)) + + +def test_sympy__vector__orienters__BodyOrienter(): + from sympy.vector.orienters import BodyOrienter + assert _test_args(BodyOrienter(x, y, z, '123')) + + +def test_sympy__vector__orienters__SpaceOrienter(): + from sympy.vector.orienters import SpaceOrienter + assert _test_args(SpaceOrienter(x, y, z, '123')) + + +def test_sympy__vector__orienters__QuaternionOrienter(): + from sympy.vector.orienters import QuaternionOrienter + a, b, c, d = symbols('a b c d') + assert _test_args(QuaternionOrienter(a, b, c, d)) + + +def test_sympy__vector__parametricregion__ParametricRegion(): + from sympy.abc import t + from sympy.vector.parametricregion import ParametricRegion + assert _test_args(ParametricRegion((t, t**3), (t, 0, 2))) + + +def test_sympy__vector__scalar__BaseScalar(): + from sympy.vector.scalar import BaseScalar + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseScalar(0, C, ' ', ' ')) + + +def test_sympy__physics__wigner__Wigner3j(): + from sympy.physics.wigner import Wigner3j + assert _test_args(Wigner3j(0, 0, 0, 0, 0, 0)) + + +def test_sympy__combinatorics__schur_number__SchurNumber(): + from sympy.combinatorics.schur_number import SchurNumber + assert _test_args(SchurNumber(x)) + + +def test_sympy__combinatorics__perm_groups__SymmetricPermutationGroup(): + from sympy.combinatorics.perm_groups import SymmetricPermutationGroup + assert _test_args(SymmetricPermutationGroup(5)) + + +def test_sympy__combinatorics__perm_groups__Coset(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.perm_groups import PermutationGroup, Coset + a = Permutation(1, 2) + b = Permutation(0, 1) + G = PermutationGroup([a, b]) + assert _test_args(Coset(a, G)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_arit.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_arit.py new file mode 100644 index 0000000000000000000000000000000000000000..251fc4c4234cbd6e82adc9a24ccea536ed6a37b7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_arit.py @@ -0,0 +1,2489 @@ +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, comp, nan, + oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (im, re, sign) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import (Max, sqrt) +from sympy.functions.elementary.trigonometric import (atan, cos, sin) +from sympy.integrals.integrals import Integral +from sympy.polys.polytools import Poly +from sympy.sets.sets import FiniteSet + +from sympy.core.parameters import distribute, evaluate +from sympy.core.expr import unchanged +from sympy.utilities.iterables import permutations +from sympy.testing.pytest import XFAIL, raises, warns +from sympy.utilities.exceptions import SymPyDeprecationWarning +from sympy.core.random import verify_numerically +from sympy.functions.elementary.trigonometric import asin + +from itertools import product + +a, c, x, y, z = symbols('a,c,x,y,z') +b = Symbol("b", positive=True) + + +def same_and_same_prec(a, b): + # stricter matching for Floats + return a == b and a._prec == b._prec + + +def test_bug1(): + assert re(x) != x + x.series(x, 0, 1) + assert re(x) != x + + +def test_Symbol(): + e = a*b + assert e == a*b + assert a*b*b == a*b**2 + assert a*b*b + c == c + a*b**2 + assert a*b*b - c == -c + a*b**2 + + x = Symbol('x', complex=True, real=False) + assert x.is_imaginary is None # could be I or 1 + I + x = Symbol('x', complex=True, imaginary=False) + assert x.is_real is None # could be 1 or 1 + I + x = Symbol('x', real=True) + assert x.is_complex + x = Symbol('x', imaginary=True) + assert x.is_complex + x = Symbol('x', real=False, imaginary=False) + assert x.is_complex is None # might be a non-number + + +def test_arit0(): + p = Rational(5) + e = a*b + assert e == a*b + e = a*b + b*a + assert e == 2*a*b + e = a*b + b*a + a*b + p*b*a + assert e == 8*a*b + e = a*b + b*a + a*b + p*b*a + a + assert e == a + 8*a*b + e = a + a + assert e == 2*a + e = a + b + a + assert e == b + 2*a + e = a + b*b + a + b*b + assert e == 2*a + 2*b**2 + e = a + Rational(2) + b*b + a + b*b + p + assert e == 7 + 2*a + 2*b**2 + e = (a + b*b + a + b*b)*p + assert e == 5*(2*a + 2*b**2) + e = (a*b*c + c*b*a + b*a*c)*p + assert e == 15*a*b*c + e = (a*b*c + c*b*a + b*a*c)*p - Rational(15)*a*b*c + assert e == Rational(0) + e = Rational(50)*(a - a) + assert e == Rational(0) + e = b*a - b - a*b + b + assert e == Rational(0) + e = a*b + c**p + assert e == a*b + c**5 + e = a/b + assert e == a*b**(-1) + e = a*2*2 + assert e == 4*a + e = 2 + a*2/2 + assert e == 2 + a + e = 2 - a - 2 + assert e == -a + e = 2*a*2 + assert e == 4*a + e = 2/a/2 + assert e == a**(-1) + e = 2**a**2 + assert e == 2**(a**2) + e = -(1 + a) + assert e == -1 - a + e = S.Half*(1 + a) + assert e == S.Half + a/2 + + +def test_div(): + e = a/b + assert e == a*b**(-1) + e = a/b + c/2 + assert e == a*b**(-1) + Rational(1)/2*c + e = (1 - b)/(b - 1) + assert e == (1 + -b)*((-1) + b)**(-1) + + +def test_pow_arit(): + n1 = Rational(1) + n2 = Rational(2) + n5 = Rational(5) + e = a*a + assert e == a**2 + e = a*a*a + assert e == a**3 + e = a*a*a*a**Rational(6) + assert e == a**9 + e = a*a*a*a**Rational(6) - a**Rational(9) + assert e == Rational(0) + e = a**(b - b) + assert e == Rational(1) + e = (a + Rational(1) - a)**b + assert e == Rational(1) + + e = (a + b + c)**n2 + assert e == (a + b + c)**2 + assert e.expand() == 2*b*c + 2*a*c + 2*a*b + a**2 + c**2 + b**2 + + e = (a + b)**n2 + assert e == (a + b)**2 + assert e.expand() == 2*a*b + a**2 + b**2 + + e = (a + b)**(n1/n2) + assert e == sqrt(a + b) + assert e.expand() == sqrt(a + b) + + n = n5**(n1/n2) + assert n == sqrt(5) + e = n*a*b - n*b*a + assert e == Rational(0) + e = n*a*b + n*b*a + assert e == 2*a*b*sqrt(5) + assert e.diff(a) == 2*b*sqrt(5) + assert e.diff(a) == 2*b*sqrt(5) + e = a/b**2 + assert e == a*b**(-2) + + assert sqrt(2*(1 + sqrt(2))) == (2*(1 + 2**S.Half))**S.Half + + x = Symbol('x') + y = Symbol('y') + + assert ((x*y)**3).expand() == y**3 * x**3 + assert ((x*y)**-3).expand() == y**-3 * x**-3 + + assert (x**5*(3*x)**(3)).expand() == 27 * x**8 + assert (x**5*(-3*x)**(3)).expand() == -27 * x**8 + assert (x**5*(3*x)**(-3)).expand() == x**2 * Rational(1, 27) + assert (x**5*(-3*x)**(-3)).expand() == x**2 * Rational(-1, 27) + + # expand_power_exp + _x = Symbol('x', zero=False) + _y = Symbol('y', zero=False) + assert (_x**(y**(x + exp(x + y)) + z)).expand(deep=False) == \ + _x**z*_x**(y**(x + exp(x + y))) + assert (_x**(_y**(x + exp(x + y)) + z)).expand() == \ + _x**z*_x**(_y**x*_y**(exp(x)*exp(y))) + + n = Symbol('n', even=False) + k = Symbol('k', even=True) + o = Symbol('o', odd=True) + + assert unchanged(Pow, -1, x) + assert unchanged(Pow, -1, n) + assert (-2)**k == 2**k + assert (-1)**k == 1 + assert (-1)**o == -1 + + +def test_pow2(): + # x**(2*y) is always (x**y)**2 but is only (x**2)**y if + # x.is_positive or y.is_integer + # let x = 1 to see why the following are not true. + assert (-x)**Rational(2, 3) != x**Rational(2, 3) + assert (-x)**Rational(5, 7) != -x**Rational(5, 7) + assert ((-x)**2)**Rational(1, 3) != ((-x)**Rational(1, 3))**2 + assert sqrt(x**2) != x + + +def test_pow3(): + assert sqrt(2)**3 == 2 * sqrt(2) + assert sqrt(2)**3 == sqrt(8) + + +def test_mod_pow(): + for s, t, u, v in [(4, 13, 497, 445), (4, -3, 497, 365), + (3.2, 2.1, 1.9, 0.1031015682350942), (S(3)/2, 5, S(5)/6, S(3)/32)]: + assert pow(S(s), t, u) == v + assert pow(S(s), S(t), u) == v + assert pow(S(s), t, S(u)) == v + assert pow(S(s), S(t), S(u)) == v + assert pow(S(2), S(10000000000), S(3)) == 1 + assert pow(x, y, z) == x**y%z + raises(TypeError, lambda: pow(S(4), "13", 497)) + raises(TypeError, lambda: pow(S(4), 13, "497")) + + +def test_pow_E(): + assert 2**(y/log(2)) == S.Exp1**y + assert 2**(y/log(2)/3) == S.Exp1**(y/3) + assert 3**(1/log(-3)) != S.Exp1 + assert (3 + 2*I)**(1/(log(-3 - 2*I) + I*pi)) == S.Exp1 + assert (4 + 2*I)**(1/(log(-4 - 2*I) + I*pi)) == S.Exp1 + assert (3 + 2*I)**(1/(log(-3 - 2*I, 3)/2 + I*pi/log(3)/2)) == 9 + assert (3 + 2*I)**(1/(log(3 + 2*I, 3)/2)) == 9 + # every time tests are run they will affirm with a different random + # value that this identity holds + while 1: + b = x._random() + r, i = b.as_real_imag() + if i: + break + assert verify_numerically(b**(1/(log(-b) + sign(i)*I*pi).n()), S.Exp1) + + +def test_pow_issue_3516(): + assert 4**Rational(1, 4) == sqrt(2) + + +def test_pow_im(): + for m in (-2, -1, 2): + for d in (3, 4, 5): + b = m*I + for i in range(1, 4*d + 1): + e = Rational(i, d) + assert (b**e - b.n()**e.n()).n(2, chop=1e-10) == 0 + + e = Rational(7, 3) + assert (2*x*I)**e == 4*2**Rational(1, 3)*(I*x)**e # same as Wolfram Alpha + im = symbols('im', imaginary=True) + assert (2*im*I)**e == 4*2**Rational(1, 3)*(I*im)**e + + args = [I, I, I, I, 2] + e = Rational(1, 3) + ans = 2**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args = [I, I, I, 2] + e = Rational(1, 3) + ans = 2**e*(-I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-3) + ans = (6*I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-1) + ans = (-6*I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + + args = [I, I, 2] + e = Rational(1, 3) + ans = (-2)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-3) + ans = (6)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-1) + ans = (-6)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + assert Mul(Pow(-1, Rational(3, 2), evaluate=False), I, I) == I + assert Mul(I*Pow(I, S.Half, evaluate=False)) == sqrt(I)*I + + +def test_real_mul(): + assert Float(0) * pi * x == 0 + assert set((Float(1) * pi * x).args) == {Float(1), pi, x} + + +def test_ncmul(): + A = Symbol("A", commutative=False) + B = Symbol("B", commutative=False) + C = Symbol("C", commutative=False) + assert A*B != B*A + assert A*B*C != C*B*A + assert A*b*B*3*C == 3*b*A*B*C + assert A*b*B*3*C != 3*b*B*A*C + assert A*b*B*3*C == 3*A*B*C*b + + assert A + B == B + A + assert (A + B)*C != C*(A + B) + + assert C*(A + B)*C != C*C*(A + B) + + assert A*A == A**2 + assert (A + B)*(A + B) == (A + B)**2 + + assert A**-1 * A == 1 + assert A/A == 1 + assert A/(A**2) == 1/A + + assert A/(1 + A) == A/(1 + A) + + assert set((A + B + 2*(A + B)).args) == \ + {A, B, 2*(A + B)} + + +def test_mul_add_identity(): + m = Mul(1, 2) + assert isinstance(m, Rational) and m.p == 2 and m.q == 1 + m = Mul(1, 2, evaluate=False) + assert isinstance(m, Mul) and m.args == (1, 2) + m = Mul(0, 1) + assert m is S.Zero + m = Mul(0, 1, evaluate=False) + assert isinstance(m, Mul) and m.args == (0, 1) + m = Add(0, 1) + assert m is S.One + m = Add(0, 1, evaluate=False) + assert isinstance(m, Add) and m.args == (0, 1) + + +def test_ncpow(): + x = Symbol('x', commutative=False) + y = Symbol('y', commutative=False) + z = Symbol('z', commutative=False) + a = Symbol('a') + b = Symbol('b') + c = Symbol('c') + + assert (x**2)*(y**2) != (y**2)*(x**2) + assert (x**-2)*y != y*(x**2) + assert 2**x*2**y != 2**(x + y) + assert 2**x*2**y*2**z != 2**(x + y + z) + assert 2**x*2**(2*x) == 2**(3*x) + assert 2**x*2**(2*x)*2**x == 2**(4*x) + assert exp(x)*exp(y) != exp(y)*exp(x) + assert exp(x)*exp(y)*exp(z) != exp(y)*exp(x)*exp(z) + assert exp(x)*exp(y)*exp(z) != exp(x + y + z) + assert x**a*x**b != x**(a + b) + assert x**a*x**b*x**c != x**(a + b + c) + assert x**3*x**4 == x**7 + assert x**3*x**4*x**2 == x**9 + assert x**a*x**(4*a) == x**(5*a) + assert x**a*x**(4*a)*x**a == x**(6*a) + + +def test_powerbug(): + x = Symbol("x") + assert x**1 != (-x)**1 + assert x**2 == (-x)**2 + assert x**3 != (-x)**3 + assert x**4 == (-x)**4 + assert x**5 != (-x)**5 + assert x**6 == (-x)**6 + + assert x**128 == (-x)**128 + assert x**129 != (-x)**129 + + assert (2*x)**2 == (-2*x)**2 + + +def test_Mul_doesnt_expand_exp(): + x = Symbol('x') + y = Symbol('y') + assert unchanged(Mul, exp(x), exp(y)) + assert unchanged(Mul, 2**x, 2**y) + assert x**2*x**3 == x**5 + assert 2**x*3**x == 6**x + assert x**(y)*x**(2*y) == x**(3*y) + assert sqrt(2)*sqrt(2) == 2 + assert 2**x*2**(2*x) == 2**(3*x) + assert sqrt(2)*2**Rational(1, 4)*5**Rational(3, 4) == 10**Rational(3, 4) + assert (x**(-log(5)/log(3))*x)/(x*x**( - log(5)/log(3))) == sympify(1) + + +def test_Mul_is_integer(): + k = Symbol('k', integer=True) + n = Symbol('n', integer=True) + nr = Symbol('nr', rational=False) + ir = Symbol('ir', irrational=True) + nz = Symbol('nz', integer=True, zero=False) + e = Symbol('e', even=True) + o = Symbol('o', odd=True) + i2 = Symbol('2', prime=True, even=True) + + assert (k/3).is_integer is None + assert (nz/3).is_integer is None + assert (nr/3).is_integer is False + assert (ir/3).is_integer is False + assert (x*k*n).is_integer is None + assert (e/2).is_integer is True + assert (e**2/2).is_integer is True + assert (2/k).is_integer is None + assert (2/k**2).is_integer is None + assert ((-1)**k*n).is_integer is True + assert (3*k*e/2).is_integer is True + assert (2*k*e/3).is_integer is None + assert (e/o).is_integer is None + assert (o/e).is_integer is False + assert (o/i2).is_integer is False + assert Mul(k, 1/k, evaluate=False).is_integer is None + assert Mul(2., S.Half, evaluate=False).is_integer is None + assert (2*sqrt(k)).is_integer is None + assert (2*k**n).is_integer is None + + s = 2**2**2**Pow(2, 1000, evaluate=False) + m = Mul(s, s, evaluate=False) + assert m.is_integer + + # broken in 1.6 and before, see #20161 + xq = Symbol('xq', rational=True) + yq = Symbol('yq', rational=True) + assert (xq*yq).is_integer is None + e_20161 = Mul(-1,Mul(1,Pow(2,-1,evaluate=False),evaluate=False),evaluate=False) + assert e_20161.is_integer is not True # expand(e_20161) -> -1/2, but no need to see that in the assumption without evaluation + + +def test_Add_Mul_is_integer(): + x = Symbol('x') + + k = Symbol('k', integer=True) + n = Symbol('n', integer=True) + nk = Symbol('nk', integer=False) + nr = Symbol('nr', rational=False) + nz = Symbol('nz', integer=True, zero=False) + + assert (-nk).is_integer is None + assert (-nr).is_integer is False + assert (2*k).is_integer is True + assert (-k).is_integer is True + + assert (k + nk).is_integer is False + assert (k + n).is_integer is True + assert (k + x).is_integer is None + assert (k + n*x).is_integer is None + assert (k + n/3).is_integer is None + assert (k + nz/3).is_integer is None + assert (k + nr/3).is_integer is False + + assert ((1 + sqrt(3))*(-sqrt(3) + 1)).is_integer is not False + assert (1 + (1 + sqrt(3))*(-sqrt(3) + 1)).is_integer is not False + + +def test_Add_Mul_is_finite(): + x = Symbol('x', extended_real=True, finite=False) + + assert sin(x).is_finite is True + assert (x*sin(x)).is_finite is None + assert (x*atan(x)).is_finite is False + assert (1024*sin(x)).is_finite is True + assert (sin(x)*exp(x)).is_finite is None + assert (sin(x)*cos(x)).is_finite is True + assert (x*sin(x)*exp(x)).is_finite is None + + assert (sin(x) - 67).is_finite is True + assert (sin(x) + exp(x)).is_finite is not True + assert (1 + x).is_finite is False + assert (1 + x**2 + (1 + x)*(1 - x)).is_finite is None + assert (sqrt(2)*(1 + x)).is_finite is False + assert (sqrt(2)*(1 + x)*(1 - x)).is_finite is False + + +def test_Mul_is_even_odd(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + + k = Symbol('k', odd=True) + n = Symbol('n', odd=True) + m = Symbol('m', even=True) + + assert (2*x).is_even is True + assert (2*x).is_odd is False + + assert (3*x).is_even is None + assert (3*x).is_odd is None + + assert (k/3).is_integer is None + assert (k/3).is_even is None + assert (k/3).is_odd is None + + assert (2*n).is_even is True + assert (2*n).is_odd is False + + assert (2*m).is_even is True + assert (2*m).is_odd is False + + assert (-n).is_even is False + assert (-n).is_odd is True + + assert (k*n).is_even is False + assert (k*n).is_odd is True + + assert (k*m).is_even is True + assert (k*m).is_odd is False + + assert (k*n*m).is_even is True + assert (k*n*m).is_odd is False + + assert (k*m*x).is_even is True + assert (k*m*x).is_odd is False + + # issue 6791: + assert (x/2).is_integer is None + assert (k/2).is_integer is False + assert (m/2).is_integer is True + + assert (x*y).is_even is None + assert (x*x).is_even is None + assert (x*(x + k)).is_even is True + assert (x*(x + m)).is_even is None + + assert (x*y).is_odd is None + assert (x*x).is_odd is None + assert (x*(x + k)).is_odd is False + assert (x*(x + m)).is_odd is None + + # issue 8648 + assert (m**2/2).is_even + assert (m**2/3).is_even is False + assert (2/m**2).is_odd is False + assert (2/m).is_odd is None + + +@XFAIL +def test_evenness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + k = Symbol('k', odd=True) + assert (x*y*(y + k)).is_even is True + assert (y*x*(x + k)).is_even is True + + +def test_evenness_in_ternary_integer_product_with_even(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + m = Symbol('m', even=True) + assert (x*y*(y + m)).is_even is None + + +@XFAIL +def test_oddness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + k = Symbol('k', odd=True) + assert (x*y*(y + k)).is_odd is False + assert (y*x*(x + k)).is_odd is False + + +def test_oddness_in_ternary_integer_product_with_even(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + m = Symbol('m', even=True) + assert (x*y*(y + m)).is_odd is None + + +def test_Mul_is_rational(): + x = Symbol('x') + n = Symbol('n', integer=True) + m = Symbol('m', integer=True, nonzero=True) + + assert (n/m).is_rational is True + assert (x/pi).is_rational is None + assert (x/n).is_rational is None + assert (m/pi).is_rational is False + + r = Symbol('r', rational=True) + assert (pi*r).is_rational is None + + # issue 8008 + z = Symbol('z', zero=True) + i = Symbol('i', imaginary=True) + assert (z*i).is_rational is True + bi = Symbol('i', imaginary=True, finite=True) + assert (z*bi).is_zero is True + + +def test_Add_is_rational(): + x = Symbol('x') + n = Symbol('n', rational=True) + m = Symbol('m', rational=True) + + assert (n + m).is_rational is True + assert (x + pi).is_rational is None + assert (x + n).is_rational is None + assert (n + pi).is_rational is False + + +def test_Add_is_even_odd(): + x = Symbol('x', integer=True) + + k = Symbol('k', odd=True) + n = Symbol('n', odd=True) + m = Symbol('m', even=True) + + assert (k + 7).is_even is True + assert (k + 7).is_odd is False + + assert (-k + 7).is_even is True + assert (-k + 7).is_odd is False + + assert (k - 12).is_even is False + assert (k - 12).is_odd is True + + assert (-k - 12).is_even is False + assert (-k - 12).is_odd is True + + assert (k + n).is_even is True + assert (k + n).is_odd is False + + assert (k + m).is_even is False + assert (k + m).is_odd is True + + assert (k + n + m).is_even is True + assert (k + n + m).is_odd is False + + assert (k + n + x + m).is_even is None + assert (k + n + x + m).is_odd is None + + +def test_Mul_is_negative_positive(): + x = Symbol('x', real=True) + y = Symbol('y', extended_real=False, complex=True) + z = Symbol('z', zero=True) + + e = 2*z + assert e.is_Mul and e.is_positive is False and e.is_negative is False + + neg = Symbol('neg', negative=True) + pos = Symbol('pos', positive=True) + nneg = Symbol('nneg', nonnegative=True) + npos = Symbol('npos', nonpositive=True) + + assert neg.is_negative is True + assert (-neg).is_negative is False + assert (2*neg).is_negative is True + + assert (2*pos)._eval_is_extended_negative() is False + assert (2*pos).is_negative is False + + assert pos.is_negative is False + assert (-pos).is_negative is True + assert (2*pos).is_negative is False + + assert (pos*neg).is_negative is True + assert (2*pos*neg).is_negative is True + assert (-pos*neg).is_negative is False + assert (pos*neg*y).is_negative is False # y.is_real=F; !real -> !neg + + assert nneg.is_negative is False + assert (-nneg).is_negative is None + assert (2*nneg).is_negative is False + + assert npos.is_negative is None + assert (-npos).is_negative is False + assert (2*npos).is_negative is None + + assert (nneg*npos).is_negative is None + + assert (neg*nneg).is_negative is None + assert (neg*npos).is_negative is False + + assert (pos*nneg).is_negative is False + assert (pos*npos).is_negative is None + + assert (npos*neg*nneg).is_negative is False + assert (npos*pos*nneg).is_negative is None + + assert (-npos*neg*nneg).is_negative is None + assert (-npos*pos*nneg).is_negative is False + + assert (17*npos*neg*nneg).is_negative is False + assert (17*npos*pos*nneg).is_negative is None + + assert (neg*npos*pos*nneg).is_negative is False + + assert (x*neg).is_negative is None + assert (nneg*npos*pos*x*neg).is_negative is None + + assert neg.is_positive is False + assert (-neg).is_positive is True + assert (2*neg).is_positive is False + + assert pos.is_positive is True + assert (-pos).is_positive is False + assert (2*pos).is_positive is True + + assert (pos*neg).is_positive is False + assert (2*pos*neg).is_positive is False + assert (-pos*neg).is_positive is True + assert (-pos*neg*y).is_positive is False # y.is_real=F; !real -> !neg + + assert nneg.is_positive is None + assert (-nneg).is_positive is False + assert (2*nneg).is_positive is None + + assert npos.is_positive is False + assert (-npos).is_positive is None + assert (2*npos).is_positive is False + + assert (nneg*npos).is_positive is False + + assert (neg*nneg).is_positive is False + assert (neg*npos).is_positive is None + + assert (pos*nneg).is_positive is None + assert (pos*npos).is_positive is False + + assert (npos*neg*nneg).is_positive is None + assert (npos*pos*nneg).is_positive is False + + assert (-npos*neg*nneg).is_positive is False + assert (-npos*pos*nneg).is_positive is None + + assert (17*npos*neg*nneg).is_positive is None + assert (17*npos*pos*nneg).is_positive is False + + assert (neg*npos*pos*nneg).is_positive is None + + assert (x*neg).is_positive is None + assert (nneg*npos*pos*x*neg).is_positive is None + + +def test_Mul_is_negative_positive_2(): + a = Symbol('a', nonnegative=True) + b = Symbol('b', nonnegative=True) + c = Symbol('c', nonpositive=True) + d = Symbol('d', nonpositive=True) + + assert (a*b).is_nonnegative is True + assert (a*b).is_negative is False + assert (a*b).is_zero is None + assert (a*b).is_positive is None + + assert (c*d).is_nonnegative is True + assert (c*d).is_negative is False + assert (c*d).is_zero is None + assert (c*d).is_positive is None + + assert (a*c).is_nonpositive is True + assert (a*c).is_positive is False + assert (a*c).is_zero is None + assert (a*c).is_negative is None + + +def test_Mul_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert k.is_nonpositive is True + assert (-k).is_nonpositive is False + assert (2*k).is_nonpositive is True + + assert n.is_nonpositive is False + assert (-n).is_nonpositive is True + assert (2*n).is_nonpositive is False + + assert (n*k).is_nonpositive is True + assert (2*n*k).is_nonpositive is True + assert (-n*k).is_nonpositive is False + + assert u.is_nonpositive is None + assert (-u).is_nonpositive is True + assert (2*u).is_nonpositive is None + + assert v.is_nonpositive is True + assert (-v).is_nonpositive is None + assert (2*v).is_nonpositive is True + + assert (u*v).is_nonpositive is True + + assert (k*u).is_nonpositive is True + assert (k*v).is_nonpositive is None + + assert (n*u).is_nonpositive is None + assert (n*v).is_nonpositive is True + + assert (v*k*u).is_nonpositive is None + assert (v*n*u).is_nonpositive is True + + assert (-v*k*u).is_nonpositive is True + assert (-v*n*u).is_nonpositive is None + + assert (17*v*k*u).is_nonpositive is None + assert (17*v*n*u).is_nonpositive is True + + assert (k*v*n*u).is_nonpositive is None + + assert (x*k).is_nonpositive is None + assert (u*v*n*x*k).is_nonpositive is None + + assert k.is_nonnegative is False + assert (-k).is_nonnegative is True + assert (2*k).is_nonnegative is False + + assert n.is_nonnegative is True + assert (-n).is_nonnegative is False + assert (2*n).is_nonnegative is True + + assert (n*k).is_nonnegative is False + assert (2*n*k).is_nonnegative is False + assert (-n*k).is_nonnegative is True + + assert u.is_nonnegative is True + assert (-u).is_nonnegative is None + assert (2*u).is_nonnegative is True + + assert v.is_nonnegative is None + assert (-v).is_nonnegative is True + assert (2*v).is_nonnegative is None + + assert (u*v).is_nonnegative is None + + assert (k*u).is_nonnegative is None + assert (k*v).is_nonnegative is True + + assert (n*u).is_nonnegative is True + assert (n*v).is_nonnegative is None + + assert (v*k*u).is_nonnegative is True + assert (v*n*u).is_nonnegative is None + + assert (-v*k*u).is_nonnegative is None + assert (-v*n*u).is_nonnegative is True + + assert (17*v*k*u).is_nonnegative is True + assert (17*v*n*u).is_nonnegative is None + + assert (k*v*n*u).is_nonnegative is True + + assert (x*k).is_nonnegative is None + assert (u*v*n*x*k).is_nonnegative is None + + +def test_Add_is_negative_positive(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert (k - 2).is_negative is True + assert (k + 17).is_negative is None + assert (-k - 5).is_negative is None + assert (-k + 123).is_negative is False + + assert (k - n).is_negative is True + assert (k + n).is_negative is None + assert (-k - n).is_negative is None + assert (-k + n).is_negative is False + + assert (k - n - 2).is_negative is True + assert (k + n + 17).is_negative is None + assert (-k - n - 5).is_negative is None + assert (-k + n + 123).is_negative is False + + assert (-2*k + 123*n + 17).is_negative is False + + assert (k + u).is_negative is None + assert (k + v).is_negative is True + assert (n + u).is_negative is False + assert (n + v).is_negative is None + + assert (u - v).is_negative is False + assert (u + v).is_negative is None + assert (-u - v).is_negative is None + assert (-u + v).is_negative is None + + assert (u - v + n + 2).is_negative is False + assert (u + v + n + 2).is_negative is None + assert (-u - v + n + 2).is_negative is None + assert (-u + v + n + 2).is_negative is None + + assert (k + x).is_negative is None + assert (k + x - n).is_negative is None + + assert (k - 2).is_positive is False + assert (k + 17).is_positive is None + assert (-k - 5).is_positive is None + assert (-k + 123).is_positive is True + + assert (k - n).is_positive is False + assert (k + n).is_positive is None + assert (-k - n).is_positive is None + assert (-k + n).is_positive is True + + assert (k - n - 2).is_positive is False + assert (k + n + 17).is_positive is None + assert (-k - n - 5).is_positive is None + assert (-k + n + 123).is_positive is True + + assert (-2*k + 123*n + 17).is_positive is True + + assert (k + u).is_positive is None + assert (k + v).is_positive is False + assert (n + u).is_positive is True + assert (n + v).is_positive is None + + assert (u - v).is_positive is None + assert (u + v).is_positive is None + assert (-u - v).is_positive is None + assert (-u + v).is_positive is False + + assert (u - v - n - 2).is_positive is None + assert (u + v - n - 2).is_positive is None + assert (-u - v - n - 2).is_positive is None + assert (-u + v - n - 2).is_positive is False + + assert (n + x).is_positive is None + assert (n + x - k).is_positive is None + + z = (-3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2) + assert z.is_zero + z = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert z.is_zero + + +def test_Add_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert (u - 2).is_nonpositive is None + assert (u + 17).is_nonpositive is False + assert (-u - 5).is_nonpositive is True + assert (-u + 123).is_nonpositive is None + + assert (u - v).is_nonpositive is None + assert (u + v).is_nonpositive is None + assert (-u - v).is_nonpositive is None + assert (-u + v).is_nonpositive is True + + assert (u - v - 2).is_nonpositive is None + assert (u + v + 17).is_nonpositive is None + assert (-u - v - 5).is_nonpositive is None + assert (-u + v - 123).is_nonpositive is True + + assert (-2*u + 123*v - 17).is_nonpositive is True + + assert (k + u).is_nonpositive is None + assert (k + v).is_nonpositive is True + assert (n + u).is_nonpositive is False + assert (n + v).is_nonpositive is None + + assert (k - n).is_nonpositive is True + assert (k + n).is_nonpositive is None + assert (-k - n).is_nonpositive is None + assert (-k + n).is_nonpositive is False + + assert (k - n + u + 2).is_nonpositive is None + assert (k + n + u + 2).is_nonpositive is None + assert (-k - n + u + 2).is_nonpositive is None + assert (-k + n + u + 2).is_nonpositive is False + + assert (u + x).is_nonpositive is None + assert (v - x - n).is_nonpositive is None + + assert (u - 2).is_nonnegative is None + assert (u + 17).is_nonnegative is True + assert (-u - 5).is_nonnegative is False + assert (-u + 123).is_nonnegative is None + + assert (u - v).is_nonnegative is True + assert (u + v).is_nonnegative is None + assert (-u - v).is_nonnegative is None + assert (-u + v).is_nonnegative is None + + assert (u - v + 2).is_nonnegative is True + assert (u + v + 17).is_nonnegative is None + assert (-u - v - 5).is_nonnegative is None + assert (-u + v - 123).is_nonnegative is False + + assert (2*u - 123*v + 17).is_nonnegative is True + + assert (k + u).is_nonnegative is None + assert (k + v).is_nonnegative is False + assert (n + u).is_nonnegative is True + assert (n + v).is_nonnegative is None + + assert (k - n).is_nonnegative is False + assert (k + n).is_nonnegative is None + assert (-k - n).is_nonnegative is None + assert (-k + n).is_nonnegative is True + + assert (k - n - u - 2).is_nonnegative is False + assert (k + n - u - 2).is_nonnegative is None + assert (-k - n - u - 2).is_nonnegative is None + assert (-k + n - u - 2).is_nonnegative is None + + assert (u - x).is_nonnegative is None + assert (v + x + n).is_nonnegative is None + + +def test_Pow_is_integer(): + x = Symbol('x') + + k = Symbol('k', integer=True) + n = Symbol('n', integer=True, nonnegative=True) + m = Symbol('m', integer=True, positive=True) + + assert (k**2).is_integer is True + assert (k**(-2)).is_integer is None + assert ((m + 1)**(-2)).is_integer is False + assert (m**(-1)).is_integer is None # issue 8580 + + assert (2**k).is_integer is None + assert (2**(-k)).is_integer is None + + assert (2**n).is_integer is True + assert (2**(-n)).is_integer is None + + assert (2**m).is_integer is True + assert (2**(-m)).is_integer is False + + assert (x**2).is_integer is None + assert (2**x).is_integer is None + + assert (k**n).is_integer is True + assert (k**(-n)).is_integer is None + + assert (k**x).is_integer is None + assert (x**k).is_integer is None + + assert (k**(n*m)).is_integer is True + assert (k**(-n*m)).is_integer is None + + assert sqrt(3).is_integer is False + assert sqrt(.3).is_integer is False + assert Pow(3, 2, evaluate=False).is_integer is True + assert Pow(3, 0, evaluate=False).is_integer is True + assert Pow(3, -2, evaluate=False).is_integer is False + assert Pow(S.Half, 3, evaluate=False).is_integer is False + # decided by re-evaluating + assert Pow(3, S.Half, evaluate=False).is_integer is False + assert Pow(3, S.Half, evaluate=False).is_integer is False + assert Pow(4, S.Half, evaluate=False).is_integer is True + assert Pow(S.Half, -2, evaluate=False).is_integer is True + + assert ((-1)**k).is_integer + + # issue 8641 + x = Symbol('x', real=True, integer=False) + assert (x**2).is_integer is None + + # issue 10458 + x = Symbol('x', positive=True) + assert (1/(x + 1)).is_integer is False + assert (1/(-x - 1)).is_integer is False + assert (-1/(x + 1)).is_integer is False + # issue 23287 + assert (x**2/2).is_integer is None + + # issue 8648-like + k = Symbol('k', even=True) + assert (k**3/2).is_integer + assert (k**3/8).is_integer + assert (k**3/16).is_integer is None + assert (2/k).is_integer is None + assert (2/k**2).is_integer is False + o = Symbol('o', odd=True) + assert (k/o).is_integer is None + o = Symbol('o', odd=True, prime=True) + assert (k/o).is_integer is False + + +def test_Pow_is_real(): + x = Symbol('x', real=True) + y = Symbol('y', positive=True) + + assert (x**2).is_real is True + assert (x**3).is_real is True + assert (x**x).is_real is None + assert (y**x).is_real is True + + assert (x**Rational(1, 3)).is_real is None + assert (y**Rational(1, 3)).is_real is True + + assert sqrt(-1 - sqrt(2)).is_real is False + + i = Symbol('i', imaginary=True) + assert (i**i).is_real is None + assert (I**i).is_extended_real is True + assert ((-I)**i).is_extended_real is True + assert (2**i).is_real is None # (2**(pi/log(2) * I)) is real, 2**I is not + assert (2**I).is_real is False + assert (2**-I).is_real is False + assert (i**2).is_extended_real is True + assert (i**3).is_extended_real is False + assert (i**x).is_real is None # could be (-I)**(2/3) + e = Symbol('e', even=True) + o = Symbol('o', odd=True) + k = Symbol('k', integer=True) + assert (i**e).is_extended_real is True + assert (i**o).is_extended_real is False + assert (i**k).is_real is None + assert (i**(4*k)).is_extended_real is True + + x = Symbol("x", nonnegative=True) + y = Symbol("y", nonnegative=True) + assert im(x**y).expand(complex=True) is S.Zero + assert (x**y).is_real is True + i = Symbol('i', imaginary=True) + assert (exp(i)**I).is_extended_real is True + assert log(exp(i)).is_imaginary is None # i could be 2*pi*I + c = Symbol('c', complex=True) + assert log(c).is_real is None # c could be 0 or 2, too + assert log(exp(c)).is_real is None # log(0), log(E), ... + n = Symbol('n', negative=False) + assert log(n).is_real is None + n = Symbol('n', nonnegative=True) + assert log(n).is_real is None + + assert sqrt(-I).is_real is False # issue 7843 + + i = Symbol('i', integer=True) + assert (1/(i-1)).is_real is None + assert (1/(i-1)).is_extended_real is None + + # test issue 20715 + from sympy.core.parameters import evaluate + x = S(-1) + with evaluate(False): + assert x.is_negative is True + + f = Pow(x, -1) + with evaluate(False): + assert f.is_imaginary is False + + +def test_real_Pow(): + k = Symbol('k', integer=True, nonzero=True) + assert (k**(I*pi/log(k))).is_real + + +def test_Pow_is_finite(): + xe = Symbol('xe', extended_real=True) + xr = Symbol('xr', real=True) + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + i = Symbol('i', integer=True) + + assert (xe**2).is_finite is None # xe could be oo + assert (xr**2).is_finite is True + + assert (xe**xe).is_finite is None + assert (xr**xe).is_finite is None + assert (xe**xr).is_finite is None + # FIXME: The line below should be True rather than None + # assert (xr**xr).is_finite is True + assert (xr**xr).is_finite is None + + assert (p**xe).is_finite is None + assert (p**xr).is_finite is True + + assert (n**xe).is_finite is None + assert (n**xr).is_finite is True + + assert (sin(xe)**2).is_finite is True + assert (sin(xr)**2).is_finite is True + + assert (sin(xe)**xe).is_finite is None # xe, xr could be -pi + assert (sin(xr)**xr).is_finite is None + + # FIXME: Should the line below be True rather than None? + assert (sin(xe)**exp(xe)).is_finite is None + assert (sin(xr)**exp(xr)).is_finite is True + + assert (1/sin(xe)).is_finite is None # if zero, no, otherwise yes + assert (1/sin(xr)).is_finite is None + + assert (1/exp(xe)).is_finite is None # xe could be -oo + assert (1/exp(xr)).is_finite is True + + assert (1/S.Pi).is_finite is True + + assert (1/(i-1)).is_finite is None + + +def test_Pow_is_even_odd(): + x = Symbol('x') + + k = Symbol('k', even=True) + n = Symbol('n', odd=True) + m = Symbol('m', integer=True, nonnegative=True) + p = Symbol('p', integer=True, positive=True) + + assert ((-1)**n).is_odd + assert ((-1)**k).is_odd + assert ((-1)**(m - p)).is_odd + + assert (k**2).is_even is True + assert (n**2).is_even is False + assert (2**k).is_even is None + assert (x**2).is_even is None + + assert (k**m).is_even is None + assert (n**m).is_even is False + + assert (k**p).is_even is True + assert (n**p).is_even is False + + assert (m**k).is_even is None + assert (p**k).is_even is None + + assert (m**n).is_even is None + assert (p**n).is_even is None + + assert (k**x).is_even is None + assert (n**x).is_even is None + + assert (k**2).is_odd is False + assert (n**2).is_odd is True + assert (3**k).is_odd is None + + assert (k**m).is_odd is None + assert (n**m).is_odd is True + + assert (k**p).is_odd is False + assert (n**p).is_odd is True + + assert (m**k).is_odd is None + assert (p**k).is_odd is None + + assert (m**n).is_odd is None + assert (p**n).is_odd is None + + assert (k**x).is_odd is None + assert (n**x).is_odd is None + + +def test_Pow_is_negative_positive(): + r = Symbol('r', real=True) + + k = Symbol('k', integer=True, positive=True) + n = Symbol('n', even=True) + m = Symbol('m', odd=True) + + x = Symbol('x') + + assert (2**r).is_positive is True + assert ((-2)**r).is_positive is None + assert ((-2)**n).is_positive is True + assert ((-2)**m).is_positive is False + + assert (k**2).is_positive is True + assert (k**(-2)).is_positive is True + + assert (k**r).is_positive is True + assert ((-k)**r).is_positive is None + assert ((-k)**n).is_positive is True + assert ((-k)**m).is_positive is False + + assert (2**r).is_negative is False + assert ((-2)**r).is_negative is None + assert ((-2)**n).is_negative is False + assert ((-2)**m).is_negative is True + + assert (k**2).is_negative is False + assert (k**(-2)).is_negative is False + + assert (k**r).is_negative is False + assert ((-k)**r).is_negative is None + assert ((-k)**n).is_negative is False + assert ((-k)**m).is_negative is True + + assert (2**x).is_positive is None + assert (2**x).is_negative is None + + +def test_Pow_is_zero(): + z = Symbol('z', zero=True) + e = z**2 + assert e.is_zero + assert e.is_positive is False + assert e.is_negative is False + + assert Pow(0, 0, evaluate=False).is_zero is False + assert Pow(0, 3, evaluate=False).is_zero + assert Pow(0, oo, evaluate=False).is_zero + assert Pow(0, -3, evaluate=False).is_zero is False + assert Pow(0, -oo, evaluate=False).is_zero is False + assert Pow(2, 2, evaluate=False).is_zero is False + + a = Symbol('a', zero=False) + assert Pow(a, 3).is_zero is False # issue 7965 + + assert Pow(2, oo, evaluate=False).is_zero is False + assert Pow(2, -oo, evaluate=False).is_zero + assert Pow(S.Half, oo, evaluate=False).is_zero + assert Pow(S.Half, -oo, evaluate=False).is_zero is False + + # All combinations of real/complex base/exponent + h = S.Half + T = True + F = False + N = None + + pow_iszero = [ + ['**', 0, h, 1, 2, -h, -1,-2,-2*I,-I/2,I/2,1+I,oo,-oo,zoo], + [ 0, F, T, T, T, F, F, F, F, F, F, N, T, F, N], + [ h, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ 1, F, F, F, F, F, F, F, F, F, F, F, F, F, N], + [ 2, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [ -h, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ -1, F, F, F, F, F, F, F, F, F, F, F, F, F, N], + [ -2, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [-2*I, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [-I/2, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ I/2, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ 1+I, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [ oo, F, F, F, F, T, T, T, F, F, F, F, F, T, N], + [ -oo, F, F, F, F, T, T, T, F, F, F, F, F, T, N], + [ zoo, F, F, F, F, T, T, T, N, N, N, N, F, T, N] + ] + + def test_table(table): + n = len(table[0]) + for row in range(1, n): + base = table[row][0] + for col in range(1, n): + exp = table[0][col] + is_zero = table[row][col] + # The actual test here: + assert Pow(base, exp, evaluate=False).is_zero is is_zero + + test_table(pow_iszero) + + # A zero symbol... + zo, zo2 = symbols('zo, zo2', zero=True) + + # All combinations of finite symbols + zf, zf2 = symbols('zf, zf2', finite=True) + wf, wf2 = symbols('wf, wf2', nonzero=True) + xf, xf2 = symbols('xf, xf2', real=True) + yf, yf2 = symbols('yf, yf2', nonzero=True) + af, af2 = symbols('af, af2', positive=True) + bf, bf2 = symbols('bf, bf2', nonnegative=True) + cf, cf2 = symbols('cf, cf2', negative=True) + df, df2 = symbols('df, df2', nonpositive=True) + + # Without finiteness: + zi, zi2 = symbols('zi, zi2') + wi, wi2 = symbols('wi, wi2', zero=False) + xi, xi2 = symbols('xi, xi2', extended_real=True) + yi, yi2 = symbols('yi, yi2', zero=False, extended_real=True) + ai, ai2 = symbols('ai, ai2', extended_positive=True) + bi, bi2 = symbols('bi, bi2', extended_nonnegative=True) + ci, ci2 = symbols('ci, ci2', extended_negative=True) + di, di2 = symbols('di, di2', extended_nonpositive=True) + + pow_iszero_sym = [ + ['**',zo,wf,yf,af,cf,zf,xf,bf,df,zi,wi,xi,yi,ai,bi,ci,di], + [ zo2, F, N, N, T, F, N, N, N, F, N, N, N, N, T, N, F, F], + [ wf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ yf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ af2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ cf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ zf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ xf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ bf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ df2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ zi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ wi2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ xi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ yi2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ ai2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ bi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ ci2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ di2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N] + ] + + test_table(pow_iszero_sym) + + # In some cases (x**x).is_zero is different from (x**y).is_zero even if y + # has the same assumptions as x. + assert (zo ** zo).is_zero is False + assert (wf ** wf).is_zero is False + assert (yf ** yf).is_zero is False + assert (af ** af).is_zero is False + assert (cf ** cf).is_zero is False + assert (zf ** zf).is_zero is None + assert (xf ** xf).is_zero is None + assert (bf ** bf).is_zero is False # None in table + assert (df ** df).is_zero is None + assert (zi ** zi).is_zero is None + assert (wi ** wi).is_zero is None + assert (xi ** xi).is_zero is None + assert (yi ** yi).is_zero is None + assert (ai ** ai).is_zero is False # None in table + assert (bi ** bi).is_zero is False # None in table + assert (ci ** ci).is_zero is None + assert (di ** di).is_zero is None + + +def test_Pow_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', integer=True, nonnegative=True) + l = Symbol('l', integer=True, positive=True) + n = Symbol('n', even=True) + m = Symbol('m', odd=True) + + assert (x**(4*k)).is_nonnegative is True + assert (2**x).is_nonnegative is True + assert ((-2)**x).is_nonnegative is None + assert ((-2)**n).is_nonnegative is True + assert ((-2)**m).is_nonnegative is False + + assert (k**2).is_nonnegative is True + assert (k**(-2)).is_nonnegative is None + assert (k**k).is_nonnegative is True + + assert (k**x).is_nonnegative is None # NOTE (0**x).is_real = U + assert (l**x).is_nonnegative is True + assert (l**x).is_positive is True + assert ((-k)**x).is_nonnegative is None + + assert ((-k)**m).is_nonnegative is None + + assert (2**x).is_nonpositive is False + assert ((-2)**x).is_nonpositive is None + assert ((-2)**n).is_nonpositive is False + assert ((-2)**m).is_nonpositive is True + + assert (k**2).is_nonpositive is None + assert (k**(-2)).is_nonpositive is None + + assert (k**x).is_nonpositive is None + assert ((-k)**x).is_nonpositive is None + assert ((-k)**n).is_nonpositive is None + + + assert (x**2).is_nonnegative is True + i = symbols('i', imaginary=True) + assert (i**2).is_nonpositive is True + assert (i**4).is_nonpositive is False + assert (i**3).is_nonpositive is False + assert (I**i).is_nonnegative is True + assert (exp(I)**i).is_nonnegative is True + + assert ((-l)**n).is_nonnegative is True + assert ((-l)**m).is_nonpositive is True + assert ((-k)**n).is_nonnegative is None + assert ((-k)**m).is_nonpositive is None + + +def test_Mul_is_imaginary_real(): + r = Symbol('r', real=True) + p = Symbol('p', positive=True) + i1 = Symbol('i1', imaginary=True) + i2 = Symbol('i2', imaginary=True) + x = Symbol('x') + + assert I.is_imaginary is True + assert I.is_real is False + assert (-I).is_imaginary is True + assert (-I).is_real is False + assert (3*I).is_imaginary is True + assert (3*I).is_real is False + assert (I*I).is_imaginary is False + assert (I*I).is_real is True + + e = (p + p*I) + j = Symbol('j', integer=True, zero=False) + assert (e**j).is_real is None + assert (e**(2*j)).is_real is None + assert (e**j).is_imaginary is None + assert (e**(2*j)).is_imaginary is None + + assert (e**-1).is_imaginary is False + assert (e**2).is_imaginary + assert (e**3).is_imaginary is False + assert (e**4).is_imaginary is False + assert (e**5).is_imaginary is False + assert (e**-1).is_real is False + assert (e**2).is_real is False + assert (e**3).is_real is False + assert (e**4).is_real is True + assert (e**5).is_real is False + assert (e**3).is_complex + + assert (r*i1).is_imaginary is None + assert (r*i1).is_real is None + + assert (x*i1).is_imaginary is None + assert (x*i1).is_real is None + + assert (i1*i2).is_imaginary is False + assert (i1*i2).is_real is True + + assert (r*i1*i2).is_imaginary is False + assert (r*i1*i2).is_real is True + + # Github's issue 5874: + nr = Symbol('nr', real=False, complex=True) # e.g. I or 1 + I + a = Symbol('a', real=True, nonzero=True) + b = Symbol('b', real=True) + assert (i1*nr).is_real is None + assert (a*nr).is_real is False + assert (b*nr).is_real is None + + ni = Symbol('ni', imaginary=False, complex=True) # e.g. 2 or 1 + I + a = Symbol('a', real=True, nonzero=True) + b = Symbol('b', real=True) + assert (i1*ni).is_real is False + assert (a*ni).is_real is None + assert (b*ni).is_real is None + + +def test_Mul_hermitian_antihermitian(): + xz, yz = symbols('xz, yz', zero=True, antihermitian=True) + xf, yf = symbols('xf, yf', hermitian=False, antihermitian=False, finite=True) + xh, yh = symbols('xh, yh', hermitian=True, antihermitian=False, nonzero=True) + xa, ya = symbols('xa, ya', hermitian=False, antihermitian=True, zero=False, finite=True) + assert (xz*xh).is_hermitian is True + assert (xz*xh).is_antihermitian is True + assert (xz*xa).is_hermitian is True + assert (xz*xa).is_antihermitian is True + assert (xf*yf).is_hermitian is None + assert (xf*yf).is_antihermitian is None + assert (xh*yh).is_hermitian is True + assert (xh*yh).is_antihermitian is False + assert (xh*ya).is_hermitian is False + assert (xh*ya).is_antihermitian is True + assert (xa*ya).is_hermitian is True + assert (xa*ya).is_antihermitian is False + + a = Symbol('a', hermitian=True, zero=False) + b = Symbol('b', hermitian=True) + c = Symbol('c', hermitian=False) + d = Symbol('d', antihermitian=True) + e1 = Mul(a, b, c, evaluate=False) + e2 = Mul(b, a, c, evaluate=False) + e3 = Mul(a, b, c, d, evaluate=False) + e4 = Mul(b, a, c, d, evaluate=False) + e5 = Mul(a, c, evaluate=False) + e6 = Mul(a, c, d, evaluate=False) + assert e1.is_hermitian is None + assert e2.is_hermitian is None + assert e1.is_antihermitian is None + assert e2.is_antihermitian is None + assert e3.is_antihermitian is None + assert e4.is_antihermitian is None + assert e5.is_antihermitian is None + assert e6.is_antihermitian is None + + +def test_Add_is_comparable(): + assert (x + y).is_comparable is False + assert (x + 1).is_comparable is False + assert (Rational(1, 3) - sqrt(8)).is_comparable is True + + +def test_Mul_is_comparable(): + assert (x*y).is_comparable is False + assert (x*2).is_comparable is False + assert (sqrt(2)*Rational(1, 3)).is_comparable is True + + +def test_Pow_is_comparable(): + assert (x**y).is_comparable is False + assert (x**2).is_comparable is False + assert (sqrt(Rational(1, 3))).is_comparable is True + + +def test_Add_is_positive_2(): + e = Rational(1, 3) - sqrt(8) + assert e.is_positive is False + assert e.is_negative is True + + e = pi - 1 + assert e.is_positive is True + assert e.is_negative is False + + +def test_Add_is_irrational(): + i = Symbol('i', irrational=True) + + assert i.is_irrational is True + assert i.is_rational is False + + assert (i + 1).is_irrational is True + assert (i + 1).is_rational is False + + +def test_Mul_is_irrational(): + expr = Mul(1, 2, 3, evaluate=False) + assert expr.is_irrational is False + expr = Mul(1, I, I, evaluate=False) + assert expr.is_rational is None # I * I = -1 but *no evaluation allowed* + # sqrt(2) * I * I = -sqrt(2) is irrational but + # this can't be determined without evaluating the + # expression and the eval_is routines shouldn't do that + expr = Mul(sqrt(2), I, I, evaluate=False) + assert expr.is_irrational is None + + +def test_issue_3531(): + # https://github.com/sympy/sympy/issues/3531 + # https://github.com/sympy/sympy/pull/18116 + class MightyNumeric(tuple): + __slots__ = () + + def __rtruediv__(self, other): + return "something" + + assert sympify(1)/MightyNumeric((1, 2)) == "something" + + +def test_issue_3531b(): + class Foo: + def __init__(self): + self.field = 1.0 + + def __mul__(self, other): + self.field = self.field * other + + def __rmul__(self, other): + self.field = other * self.field + f = Foo() + x = Symbol("x") + assert f*x == x*f + + +def test_bug3(): + a = Symbol("a") + b = Symbol("b", positive=True) + e = 2*a + b + f = b + 2*a + assert e == f + + +def test_suppressed_evaluation(): + a = Add(0, 3, 2, evaluate=False) + b = Mul(1, 3, 2, evaluate=False) + c = Pow(3, 2, evaluate=False) + assert a != 6 + assert a.func is Add + assert a.args == (0, 3, 2) + assert b != 6 + assert b.func is Mul + assert b.args == (1, 3, 2) + assert c != 9 + assert c.func is Pow + assert c.args == (3, 2) + + +def test_AssocOp_doit(): + a = Add(x,x, evaluate=False) + b = Mul(y,y, evaluate=False) + c = Add(b,b, evaluate=False) + d = Mul(a,a, evaluate=False) + assert c.doit(deep=False).func == Mul + assert c.doit(deep=False).args == (2,y,y) + assert c.doit().func == Mul + assert c.doit().args == (2, Pow(y,2)) + assert d.doit(deep=False).func == Pow + assert d.doit(deep=False).args == (a, 2*S.One) + assert d.doit().func == Mul + assert d.doit().args == (4*S.One, Pow(x,2)) + + +def test_Add_Mul_Expr_args(): + nonexpr = [Basic(), Poly(x, x), FiniteSet(x)] + for typ in [Add, Mul]: + for obj in nonexpr: + # The cache can mess with the stacklevel check + with warns(SymPyDeprecationWarning, test_stacklevel=False): + typ(obj, 1) + + +def test_Add_as_coeff_mul(): + # issue 5524. These should all be (1, self) + assert (x + 1).as_coeff_mul() == (1, (x + 1,)) + assert (x + 2).as_coeff_mul() == (1, (x + 2,)) + assert (x + 3).as_coeff_mul() == (1, (x + 3,)) + + assert (x - 1).as_coeff_mul() == (1, (x - 1,)) + assert (x - 2).as_coeff_mul() == (1, (x - 2,)) + assert (x - 3).as_coeff_mul() == (1, (x - 3,)) + + n = Symbol('n', integer=True) + assert (n + 1).as_coeff_mul() == (1, (n + 1,)) + assert (n + 2).as_coeff_mul() == (1, (n + 2,)) + assert (n + 3).as_coeff_mul() == (1, (n + 3,)) + + assert (n - 1).as_coeff_mul() == (1, (n - 1,)) + assert (n - 2).as_coeff_mul() == (1, (n - 2,)) + assert (n - 3).as_coeff_mul() == (1, (n - 3,)) + + +def test_Pow_as_coeff_mul_doesnt_expand(): + assert exp(x + y).as_coeff_mul() == (1, (exp(x + y),)) + assert exp(x + exp(x + y)) != exp(x + exp(x)*exp(y)) + +def test_issue_24751(): + expr = Add(-2, -3, evaluate=False) + expr1 = Add(-1, expr, evaluate=False) + assert int(expr1) == int((-3 - 2) - 1) + + +def test_issue_3514_18626(): + assert sqrt(S.Half) * sqrt(6) == 2 * sqrt(3)/2 + assert S.Half*sqrt(6)*sqrt(2) == sqrt(3) + assert sqrt(6)/2*sqrt(2) == sqrt(3) + assert sqrt(6)*sqrt(2)/2 == sqrt(3) + assert sqrt(8)**Rational(2, 3) == 2 + + +def test_make_args(): + assert Add.make_args(x) == (x,) + assert Mul.make_args(x) == (x,) + + assert Add.make_args(x*y*z) == (x*y*z,) + assert Mul.make_args(x*y*z) == (x*y*z).args + + assert Add.make_args(x + y + z) == (x + y + z).args + assert Mul.make_args(x + y + z) == (x + y + z,) + + assert Add.make_args((x + y)**z) == ((x + y)**z,) + assert Mul.make_args((x + y)**z) == ((x + y)**z,) + + +def test_issue_5126(): + assert (-2)**x*(-3)**x != 6**x + i = Symbol('i', integer=1) + assert (-2)**i*(-3)**i == 6**i + + +def test_Rational_as_content_primitive(): + c, p = S.One, S.Zero + assert (c*p).as_content_primitive() == (c, p) + c, p = S.Half, S.One + assert (c*p).as_content_primitive() == (c, p) + + +def test_Add_as_content_primitive(): + assert (x + 2).as_content_primitive() == (1, x + 2) + + assert (3*x + 2).as_content_primitive() == (1, 3*x + 2) + assert (3*x + 3).as_content_primitive() == (3, x + 1) + assert (3*x + 6).as_content_primitive() == (3, x + 2) + + assert (3*x + 2*y).as_content_primitive() == (1, 3*x + 2*y) + assert (3*x + 3*y).as_content_primitive() == (3, x + y) + assert (3*x + 6*y).as_content_primitive() == (3, x + 2*y) + + assert (3/x + 2*x*y*z**2).as_content_primitive() == (1, 3/x + 2*x*y*z**2) + assert (3/x + 3*x*y*z**2).as_content_primitive() == (3, 1/x + x*y*z**2) + assert (3/x + 6*x*y*z**2).as_content_primitive() == (3, 1/x + 2*x*y*z**2) + + assert (2*x/3 + 4*y/9).as_content_primitive() == \ + (Rational(2, 9), 3*x + 2*y) + assert (2*x/3 + 2.5*y).as_content_primitive() == \ + (Rational(1, 3), 2*x + 7.5*y) + + # the coefficient may sort to a position other than 0 + p = 3 + x + y + assert (2*p).expand().as_content_primitive() == (2, p) + assert (2.0*p).expand().as_content_primitive() == (1, 2.*p) + p *= -1 + assert (2*p).expand().as_content_primitive() == (2, p) + + +def test_Mul_as_content_primitive(): + assert (2*x).as_content_primitive() == (2, x) + assert (x*(2 + 2*x)).as_content_primitive() == (2, x*(1 + x)) + assert (x*(2 + 2*y)*(3*x + 3)**2).as_content_primitive() == \ + (18, x*(1 + y)*(x + 1)**2) + assert ((2 + 2*x)**2*(3 + 6*x) + S.Half).as_content_primitive() == \ + (S.Half, 24*(x + 1)**2*(2*x + 1) + 1) + + +def test_Pow_as_content_primitive(): + assert (x**y).as_content_primitive() == (1, x**y) + assert ((2*x + 2)**y).as_content_primitive() == \ + (1, (Mul(2, (x + 1), evaluate=False))**y) + assert ((2*x + 2)**3).as_content_primitive() == (8, (x + 1)**3) + + +def test_issue_5460(): + u = Mul(2, (1 + x), evaluate=False) + assert (2 + u).args == (2, u) + + +def test_product_irrational(): + assert (I*pi).is_irrational is False + # The following used to be deduced from the above bug: + assert (I*pi).is_positive is False + + +def test_issue_5919(): + assert (x/(y*(1 + y))).expand() == x/(y**2 + y) + + +def test_Mod(): + assert Mod(x, 1).func is Mod + assert pi % pi is S.Zero + assert Mod(5, 3) == 2 + assert Mod(-5, 3) == 1 + assert Mod(5, -3) == -1 + assert Mod(-5, -3) == -2 + assert type(Mod(3.2, 2, evaluate=False)) == Mod + assert 5 % x == Mod(5, x) + assert x % 5 == Mod(x, 5) + assert x % y == Mod(x, y) + assert (x % y).subs({x: 5, y: 3}) == 2 + assert Mod(nan, 1) is nan + assert Mod(1, nan) is nan + assert Mod(nan, nan) is nan + + assert Mod(0, x) == 0 + with raises(ZeroDivisionError): + Mod(x, 0) + + k = Symbol('k', integer=True) + m = Symbol('m', integer=True, positive=True) + assert (x**m % x).func is Mod + assert (k**(-m) % k).func is Mod + assert k**m % k == 0 + assert (-2*k)**m % k == 0 + + # Float handling + point3 = Float(3.3) % 1 + assert (x - 3.3) % 1 == Mod(1.*x + 1 - point3, 1) + assert Mod(-3.3, 1) == 1 - point3 + assert Mod(0.7, 1) == Float(0.7) + e = Mod(1.3, 1) + assert comp(e, .3) and e.is_Float + e = Mod(1.3, .7) + assert comp(e, .6) and e.is_Float + e = Mod(1.3, Rational(7, 10)) + assert comp(e, .6) and e.is_Float + e = Mod(Rational(13, 10), 0.7) + assert comp(e, .6) and e.is_Float + e = Mod(Rational(13, 10), Rational(7, 10)) + assert comp(e, .6) and e.is_Rational + + # check that sign is right + r2 = sqrt(2) + r3 = sqrt(3) + for i in [-r3, -r2, r2, r3]: + for j in [-r3, -r2, r2, r3]: + assert verify_numerically(i % j, i.n() % j.n()) + for _x in range(4): + for _y in range(9): + reps = [(x, _x), (y, _y)] + assert Mod(3*x + y, 9).subs(reps) == (3*_x + _y) % 9 + + # denesting + t = Symbol('t', real=True) + assert Mod(Mod(x, t), t) == Mod(x, t) + assert Mod(-Mod(x, t), t) == Mod(-x, t) + assert Mod(Mod(x, 2*t), t) == Mod(x, t) + assert Mod(-Mod(x, 2*t), t) == Mod(-x, t) + assert Mod(Mod(x, t), 2*t) == Mod(x, t) + assert Mod(-Mod(x, t), -2*t) == -Mod(x, t) + for i in [-4, -2, 2, 4]: + for j in [-4, -2, 2, 4]: + for k in range(4): + assert Mod(Mod(x, i), j).subs({x: k}) == (k % i) % j + assert Mod(-Mod(x, i), j).subs({x: k}) == -(k % i) % j + + # known difference + assert Mod(5*sqrt(2), sqrt(5)) == 5*sqrt(2) - 3*sqrt(5) + p = symbols('p', positive=True) + assert Mod(2, p + 3) == 2 + assert Mod(-2, p + 3) == p + 1 + assert Mod(2, -p - 3) == -p - 1 + assert Mod(-2, -p - 3) == -2 + assert Mod(p + 5, p + 3) == 2 + assert Mod(-p - 5, p + 3) == p + 1 + assert Mod(p + 5, -p - 3) == -p - 1 + assert Mod(-p - 5, -p - 3) == -2 + assert Mod(p + 1, p - 1).func is Mod + + # issue 27749 + n = symbols('n', integer=True, positive=True) + assert unchanged(Mod, 1, n) + n = symbols('n', prime=True) + assert Mod(1, n) == 1 + + # handling sums + assert (x + 3) % 1 == Mod(x, 1) + assert (x + 3.0) % 1 == Mod(1.*x, 1) + assert (x - S(33)/10) % 1 == Mod(x + S(7)/10, 1) + + a = Mod(.6*x + y, .3*y) + b = Mod(0.1*y + 0.6*x, 0.3*y) + # Test that a, b are equal, with 1e-14 accuracy in coefficients + eps = 1e-14 + assert abs((a.args[0] - b.args[0]).subs({x: 1, y: 1})) < eps + assert abs((a.args[1] - b.args[1]).subs({x: 1, y: 1})) < eps + + assert (x + 1) % x == 1 % x + assert (x + y) % x == y % x + assert (x + y + 2) % x == (y + 2) % x + assert (a + 3*x + 1) % (2*x) == Mod(a + x + 1, 2*x) + assert (12*x + 18*y) % (3*x) == 3*Mod(6*y, x) + + # gcd extraction + assert (-3*x) % (-2*y) == -Mod(3*x, 2*y) + assert (.6*pi) % (.3*x*pi) == 0.3*pi*Mod(2, x) + assert (.6*pi) % (.31*x*pi) == pi*Mod(0.6, 0.31*x) + assert (6*pi) % (.3*x*pi) == 0.3*pi*Mod(20, x) + assert (6*pi) % (.31*x*pi) == pi*Mod(6, 0.31*x) + assert (6*pi) % (.42*x*pi) == pi*Mod(6, 0.42*x) + assert (12*x) % (2*y) == 2*Mod(6*x, y) + assert (12*x) % (3*5*y) == 3*Mod(4*x, 5*y) + assert (12*x) % (15*x*y) == 3*x*Mod(4, 5*y) + assert (-2*pi) % (3*pi) == pi + assert (2*x + 2) % (x + 1) == 0 + assert (x*(x + 1)) % (x + 1) == (x + 1)*Mod(x, 1) + assert Mod(5.0*x, 0.1*y) == 0.1*Mod(50*x, y) + i = Symbol('i', integer=True) + assert (3*i*x) % (2*i*y) == i*Mod(3*x, 2*y) + assert Mod(4*i, 4) == 0 + + # issue 8677 + n = Symbol('n', integer=True, positive=True) + assert factorial(n) % n == 0 + assert factorial(n + 2) % n == 0 + assert (factorial(n + 4) % (n + 5)).func is Mod + + # Wilson's theorem + assert factorial(18042, evaluate=False) % 18043 == 18042 + p = Symbol('n', prime=True) + assert factorial(p - 1) % p == p - 1 + assert factorial(p - 1) % -p == -1 + assert (factorial(3, evaluate=False) % 4).doit() == 2 + n = Symbol('n', composite=True, odd=True) + assert factorial(n - 1) % n == 0 + + # symbolic with known parity + n = Symbol('n', even=True) + assert Mod(n, 2) == 0 + n = Symbol('n', odd=True) + assert Mod(n, 2) == 1 + + # issue 10963 + assert (x**6000%400).args[1] == 400 + + #issue 13543 + assert Mod(Mod(x + 1, 2) + 1, 2) == Mod(x, 2) + + x1 = Symbol('x1', integer=True) + assert Mod(Mod(x1 + 2, 4)*(x1 + 4), 4) == Mod(x1*(x1 + 2), 4) + assert Mod(Mod(x1 + 2, 4)*4, 4) == 0 + + # issue 15493 + i, j = symbols('i j', integer=True, positive=True) + assert Mod(3*i, 2) == Mod(i, 2) + assert Mod(8*i/j, 4) == 4*Mod(2*i/j, 1) + assert Mod(8*i, 4) == 0 + + # rewrite + assert Mod(x, y).rewrite(floor) == x - y*floor(x/y) + assert ((x - Mod(x, y))/y).rewrite(floor) == floor(x/y) + + # issue 21373 + from sympy.functions.elementary.hyperbolic import sinh + from sympy.functions.elementary.piecewise import Piecewise + + x_r, y_r = symbols('x_r y_r', real=True) + assert (Piecewise((x_r, y_r > x_r), (y_r, True)) / z) % 1 + expr = exp(sinh(Piecewise((x_r, y_r > x_r), (y_r, True)) / z)) + expr.subs({1: 1.0}) + sinh(Piecewise((x_r, y_r > x_r), (y_r, True)) * z ** -1.0).is_zero + + # issue 24215 + from sympy.abc import phi + assert Mod(4.0*Mod(phi, 1) , 2) == 2.0*(Mod(2*(Mod(phi, 1)), 1)) + + xi = symbols('x', integer=True) + assert unchanged(Mod, xi, 2) + assert Mod(3*xi, 2) == Mod(xi, 2) + assert unchanged(Mod, 3*x, 2) + + +def test_Mod_Pow(): + # modular exponentiation + assert isinstance(Mod(Pow(2, 2, evaluate=False), 3), Integer) + + assert Mod(Pow(4, 13, evaluate=False), 497) == Mod(Pow(4, 13), 497) + assert Mod(Pow(2, 10000000000, evaluate=False), 3) == 1 + assert Mod(Pow(32131231232, 9**10**6, evaluate=False),10**12) == \ + pow(32131231232,9**10**6,10**12) + assert Mod(Pow(33284959323, 123**999, evaluate=False),11**13) == \ + pow(33284959323,123**999,11**13) + assert Mod(Pow(78789849597, 333**555, evaluate=False),12**9) == \ + pow(78789849597,333**555,12**9) + + # modular nested exponentiation + expr = Pow(2, 2, evaluate=False) + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 16 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 6487 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 32191 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 18016 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 5137 + + expr = Pow(2, 2, evaluate=False) + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 16 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 256 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 6487 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 38281 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 15928 + + expr = Pow(2, 2, evaluate=False) + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 256 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 9229 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 25708 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 26608 + expr = Pow(expr, expr, evaluate=False) + # XXX This used to fail in a nondeterministic way because of overflow + # error. + assert Mod(expr, 3**10) == 1966 + + +def test_Mod_is_integer(): + p = Symbol('p', integer=True) + q1 = Symbol('q1', integer=True) + q2 = Symbol('q2', integer=True, nonzero=True) + assert Mod(x, y).is_integer is None + assert Mod(p, q1).is_integer is None + assert Mod(x, q2).is_integer is None + assert Mod(p, q2).is_integer + + +def test_Mod_is_nonposneg(): + n = Symbol('n', integer=True) + k = Symbol('k', integer=True, positive=True) + assert (n%3).is_nonnegative + assert Mod(n, -3).is_nonpositive + assert Mod(n, k).is_nonnegative + assert Mod(n, -k).is_nonpositive + assert Mod(k, n).is_nonnegative is None + + +def test_issue_6001(): + A = Symbol("A", commutative=False) + eq = A + A**2 + # it doesn't matter whether it's True or False; they should + # just all be the same + assert ( + eq.is_commutative == + (eq + 1).is_commutative == + (A + 1).is_commutative) + + B = Symbol("B", commutative=False) + # Although commutative terms could cancel we return True + # meaning "there are non-commutative symbols; aftersubstitution + # that definition can change, e.g. (A*B).subs(B,A**-1) -> 1 + assert (sqrt(2)*A).is_commutative is False + assert (sqrt(2)*A*B).is_commutative is False + + +def test_polar(): + from sympy.functions.elementary.complexes import polar_lift + p = Symbol('p', polar=True) + x = Symbol('x') + assert p.is_polar + assert x.is_polar is None + assert S.One.is_polar is None + assert (p**x).is_polar is True + assert (x**p).is_polar is None + assert ((2*p)**x).is_polar is True + assert (2*p).is_polar is True + assert (-2*p).is_polar is not True + assert (polar_lift(-2)*p).is_polar is True + + q = Symbol('q', polar=True) + assert (p*q)**2 == p**2 * q**2 + assert (2*q)**2 == 4 * q**2 + assert ((p*q)**x).expand() == p**x * q**x + + +def test_issue_6040(): + a, b = Pow(1, 2, evaluate=False), S.One + assert a != b + assert b != a + assert not (a == b) + assert not (b == a) + + +def test_issue_6082(): + # Comparison is symmetric + assert Basic.compare(Max(x, 1), Max(x, 2)) == \ + - Basic.compare(Max(x, 2), Max(x, 1)) + # Equal expressions compare equal + assert Basic.compare(Max(x, 1), Max(x, 1)) == 0 + # Basic subtypes (such as Max) compare different than standard types + assert Basic.compare(Max(1, x), frozenset((1, x))) != 0 + + +def test_issue_6077(): + assert x**2.0/x == x**1.0 + assert x/x**2.0 == x**-1.0 + assert x*x**2.0 == x**3.0 + assert x**1.5*x**2.5 == x**4.0 + + assert 2**(2.0*x)/2**x == 2**(1.0*x) + assert 2**x/2**(2.0*x) == 2**(-1.0*x) + assert 2**x*2**(2.0*x) == 2**(3.0*x) + assert 2**(1.5*x)*2**(2.5*x) == 2**(4.0*x) + + +def test_mul_flatten_oo(): + p = symbols('p', positive=True) + n, m = symbols('n,m', negative=True) + x_im = symbols('x_im', imaginary=True) + assert n*oo is -oo + assert n*m*oo is oo + assert p*oo is oo + assert x_im*oo != I*oo # i could be +/- 3*I -> +/-oo + + +def test_add_flatten(): + # see https://github.com/sympy/sympy/issues/2633#issuecomment-29545524 + a = oo + I*oo + b = oo - I*oo + assert a + b is nan + assert a - b is nan + # FIXME: This evaluates as: + # >>> 1/a + # 0*(oo + oo*I) + # which should not simplify to 0. Should be fixed in Pow.eval + #assert (1/a).simplify() == (1/b).simplify() == 0 + + a = Pow(2, 3, evaluate=False) + assert a + a == 16 + + +def test_issue_5160_6087_6089_6090(): + # issue 6087 + assert ((-2*x*y**y)**3.2).n(2) == (2**3.2*(-x*y**y)**3.2).n(2) + # issue 6089 + A, B, C = symbols('A,B,C', commutative=False) + assert (2.*B*C)**3 == 8.0*(B*C)**3 + assert (-2.*B*C)**3 == -8.0*(B*C)**3 + assert (-2*B*C)**2 == 4*(B*C)**2 + # issue 5160 + assert sqrt(-1.0*x) == 1.0*sqrt(-x) + assert sqrt(1.0*x) == 1.0*sqrt(x) + # issue 6090 + assert (-2*x*y*A*B)**2 == 4*x**2*y**2*(A*B)**2 + + +def test_float_int_round(): + assert int(float(sqrt(10))) == int(sqrt(10)) + assert int(pi**1000) % 10 == 2 + assert int(Float('1.123456789012345678901234567890e20', '')) == \ + int(112345678901234567890) + assert int(Float('1.123456789012345678901234567890e25', '')) == \ + int(11234567890123456789012345) + # decimal forces float so it's not an exact integer ending in 000000 + assert int(Float('1.123456789012345678901234567890e35', '')) == \ + 112345678901234567890123456789000192 + assert int(Float('123456789012345678901234567890e5', '')) == \ + 12345678901234567890123456789000000 + assert Integer(Float('1.123456789012345678901234567890e20', '')) == \ + 112345678901234567890 + assert Integer(Float('1.123456789012345678901234567890e25', '')) == \ + 11234567890123456789012345 + # decimal forces float so it's not an exact integer ending in 000000 + assert Integer(Float('1.123456789012345678901234567890e35', '')) == \ + 112345678901234567890123456789000192 + assert Integer(Float('123456789012345678901234567890e5', '')) == \ + 12345678901234567890123456789000000 + assert same_and_same_prec(Float('123000e-2',''), Float('1230.00', '')) + assert same_and_same_prec(Float('123000e2',''), Float('12300000', '')) + + assert int(1 + Rational('.9999999999999999999999999')) == 1 + assert int(pi/1e20) == 0 + assert int(1 + pi/1e20) == 1 + assert int(Add(1.2, -2, evaluate=False)) == int(1.2 - 2) + assert int(Add(1.2, +2, evaluate=False)) == int(1.2 + 2) + assert int(Add(1 + Float('.99999999999999999', ''), evaluate=False)) == 1 + raises(TypeError, lambda: float(x)) + raises(TypeError, lambda: float(sqrt(-1))) + + assert int(12345678901234567890 + cos(1)**2 + sin(1)**2) == \ + 12345678901234567891 + + +def test_issue_6611a(): + assert Mul.flatten([3**Rational(1, 3), + Pow(-Rational(1, 9), Rational(2, 3), evaluate=False)]) == \ + ([Rational(1, 3), (-1)**Rational(2, 3)], [], None) + + +def test_denest_add_mul(): + # when working with evaluated expressions make sure they denest + eq = x + 1 + eq = Add(eq, 2, evaluate=False) + eq = Add(eq, 2, evaluate=False) + assert Add(*eq.args) == x + 5 + eq = x*2 + eq = Mul(eq, 2, evaluate=False) + eq = Mul(eq, 2, evaluate=False) + assert Mul(*eq.args) == 8*x + # but don't let them denest unnecessarily + eq = Mul(-2, x - 2, evaluate=False) + assert 2*eq == Mul(-4, x - 2, evaluate=False) + assert -eq == Mul(2, x - 2, evaluate=False) + + +def test_mul_coeff(): + # It is important that all Numbers be removed from the seq; + # This can be tricky when powers combine to produce those numbers + p = exp(I*pi/3) + assert p**2*x*p*y*p*x*p**2 == x**2*y + + +def test_mul_zero_detection(): + nz = Dummy(real=True, zero=False) + r = Dummy(extended_real=True) + c = Dummy(real=False, complex=True) + c2 = Dummy(real=False, complex=True) + i = Dummy(imaginary=True) + e = nz*r*c + assert e.is_imaginary is None + assert e.is_extended_real is None + e = nz*c + assert e.is_imaginary is None + assert e.is_extended_real is False + e = nz*i*c + assert e.is_imaginary is False + assert e.is_extended_real is None + # check for more than one complex; it is important to use + # uniquely named Symbols to ensure that two factors appear + # e.g. if the symbols have the same name they just become + # a single factor, a power. + e = nz*i*c*c2 + assert e.is_imaginary is None + assert e.is_extended_real is None + + # _eval_is_extended_real and _eval_is_zero both employ trapping of the + # zero value so args should be tested in both directions and + # TO AVOID GETTING THE CACHED RESULT, Dummy MUST BE USED + + # real is unknown + def test(z, b, e): + if z.is_zero and b.is_finite: + assert e.is_extended_real and e.is_zero + else: + assert e.is_extended_real is None + if b.is_finite: + if z.is_zero: + assert e.is_zero + else: + assert e.is_zero is None + elif b.is_finite is False: + if z.is_zero is None: + assert e.is_zero is None + else: + assert e.is_zero is False + + + for iz, ib in product(*[[True, False, None]]*2): + z = Dummy('z', nonzero=iz) + b = Dummy('f', finite=ib) + e = Mul(z, b, evaluate=False) + test(z, b, e) + z = Dummy('nz', nonzero=iz) + b = Dummy('f', finite=ib) + e = Mul(b, z, evaluate=False) + test(z, b, e) + + # real is True + def test(z, b, e): + if z.is_zero and not b.is_finite: + assert e.is_extended_real is None + else: + assert e.is_extended_real is True + + for iz, ib in product(*[[True, False, None]]*2): + z = Dummy('z', nonzero=iz, extended_real=True) + b = Dummy('b', finite=ib, extended_real=True) + e = Mul(z, b, evaluate=False) + test(z, b, e) + z = Dummy('z', nonzero=iz, extended_real=True) + b = Dummy('b', finite=ib, extended_real=True) + e = Mul(b, z, evaluate=False) + test(z, b, e) + + +def test_Mul_with_zero_infinite(): + zer = Dummy(zero=True) + inf = Dummy(finite=False) + + e = Mul(zer, inf, evaluate=False) + assert e.is_extended_positive is None + assert e.is_hermitian is None + + e = Mul(inf, zer, evaluate=False) + assert e.is_extended_positive is None + assert e.is_hermitian is None + + +def test_Mul_does_not_cancel_infinities(): + a, b = symbols('a b') + assert ((zoo + 3*a)/(3*a + zoo)) is nan + assert ((b - oo)/(b - oo)) is nan + # issue 13904 + expr = (1/(a+b) + 1/(a-b))/(1/(a+b) - 1/(a-b)) + assert expr.subs(b, a) is nan + + +def test_Mul_does_not_distribute_infinity(): + a, b = symbols('a b') + assert ((1 + I)*oo).is_Mul + assert ((a + b)*(-oo)).is_Mul + assert ((a + 1)*zoo).is_Mul + assert ((1 + I)*oo).is_finite is False + z = (1 + I)*oo + assert ((1 - I)*z).expand() is oo + + +def test_Mul_does_not_let_0_trump_inf(): + assert Mul(*[0, a + zoo]) is S.NaN + assert Mul(*[0, a + oo]) is S.NaN + assert Mul(*[0, a + Integral(1/x**2, (x, 1, oo))]) is S.Zero + # Integral is treated like an unknown like 0*x -> 0 + assert Mul(*[0, a + Integral(x, (x, 1, oo))]) is S.Zero + + +def test_issue_8247_8354(): + from sympy.functions.elementary.trigonometric import tan + z = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert z.is_positive is False # it's 0 + z = S('''-2**(1/3)*(3*sqrt(93) + 29)**2 - 4*(3*sqrt(93) + 29)**(4/3) + + 12*sqrt(93)*(3*sqrt(93) + 29)**(1/3) + 116*(3*sqrt(93) + 29)**(1/3) + + 174*2**(1/3)*sqrt(93) + 1678*2**(1/3)''') + assert z.is_positive is False # it's 0 + z = 2*(-3*tan(19*pi/90) + sqrt(3))*cos(11*pi/90)*cos(19*pi/90) - \ + sqrt(3)*(-3 + 4*cos(19*pi/90)**2) + assert z.is_positive is not True # it's zero and it shouldn't hang + z = S('''9*(3*sqrt(93) + 29)**(2/3)*((3*sqrt(93) + + 29)**(1/3)*(-2**(2/3)*(3*sqrt(93) + 29)**(1/3) - 2) - 2*2**(1/3))**3 + + 72*(3*sqrt(93) + 29)**(2/3)*(81*sqrt(93) + 783) + (162*sqrt(93) + + 1566)*((3*sqrt(93) + 29)**(1/3)*(-2**(2/3)*(3*sqrt(93) + 29)**(1/3) - + 2) - 2*2**(1/3))**2''') + assert z.is_positive is False # it's 0 (and a single _mexpand isn't enough) + + +def test_Add_is_zero(): + x, y = symbols('x y', zero=True) + assert (x + y).is_zero + + # Issue 15873 + e = -2*I + (1 + I)**2 + assert e.is_zero is None + + +def test_issue_14392(): + assert (sin(zoo)**2).as_real_imag() == (nan, nan) + + +def test_divmod(): + assert divmod(x, y) == (x//y, x % y) + assert divmod(x, 3) == (x//3, x % 3) + assert divmod(3, x) == (3//x, 3 % x) + + +def test__neg__(): + assert -(x*y) == -x*y + assert -(-x*y) == x*y + assert -(1.*x) == -1.*x + assert -(-1.*x) == 1.*x + assert -(2.*x) == -2.*x + assert -(-2.*x) == 2.*x + with distribute(False): + eq = -(x + y) + assert eq.is_Mul and eq.args == (-1, x + y) + with evaluate(False): + eq = -(x + y) + assert eq.is_Mul and eq.args == (-1, x + y) + + +def test_issue_18507(): + assert Mul(zoo, zoo, 0) is nan + + +def test_issue_17130(): + e = Add(b, -b, I, -I, evaluate=False) + assert e.is_zero is None # ideally this would be True + + +def test_issue_21034(): + e = -I*log((re(asin(5)) + I*im(asin(5)))/sqrt(re(asin(5))**2 + im(asin(5))**2))/pi + assert e.round(2) + + +def test_issue_22021(): + from sympy.calculus.accumulationbounds import AccumBounds + # these objects are special cases in Mul + from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensor_heads + L = TensorIndexType("L") + i = tensor_indices("i", L) + A, B = tensor_heads("A B", [L]) + e = A(i) + B(i) + assert -e == -1*e + e = zoo + x + assert -e == -1*e + a = AccumBounds(1, 2) + e = a + x + assert -e == -1*e + for args in permutations((zoo, a, x)): + e = Add(*args, evaluate=False) + assert -e == -1*e + assert 2*Add(1, x, x, evaluate=False) == 4*x + 2 + + +def test_issue_22244(): + assert -(zoo*x) == zoo*x + + +def test_issue_22453(): + from sympy.utilities.iterables import cartes + e = Symbol('e', extended_positive=True) + for a, b in cartes(*[[oo, -oo, 3]]*2): + if a == b == 3: + continue + i = a + I*b + assert i**(1 + e) is S.ComplexInfinity + assert i**-e is S.Zero + assert unchanged(Pow, i, e) + assert 1/(oo + I*oo) is S.Zero + r, i = [Dummy(infinite=True, extended_real=True) for _ in range(2)] + assert 1/(r + I*i) is S.Zero + assert 1/(3 + I*i) is S.Zero + assert 1/(r + I*3) is S.Zero + + +def test_issue_22613(): + assert (0**(x - 2)).as_content_primitive() == (1, 0**(x - 2)) + assert (0**(x + 2)).as_content_primitive() == (1, 0**(x + 2)) + + +def test_issue_25176(): + assert sqrt(-4*3**(S(3)/4)*I/3) == 2*3**(S(7)/8)*sqrt(-I)/3 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..574e90178fb489fe99c99ea0c72df57ceec4b249 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py @@ -0,0 +1,1335 @@ +from sympy.core.mod import Mod +from sympy.core.numbers import (I, oo, pi) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (asin, sin) +from sympy.simplify.simplify import simplify +from sympy.core import Symbol, S, Rational, Integer, Dummy, Wild, Pow +from sympy.core.assumptions import (assumptions, check_assumptions, + failing_assumptions, common_assumptions, _generate_assumption_rules, + _load_pre_generated_assumption_rules) +from sympy.core.facts import InconsistentAssumptions +from sympy.core.random import seed +from sympy.combinatorics import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup + +from sympy.testing.pytest import raises, XFAIL + + +def test_symbol_unset(): + x = Symbol('x', real=True, integer=True) + assert x.is_real is True + assert x.is_integer is True + assert x.is_imaginary is False + assert x.is_noninteger is False + assert x.is_number is False + + +def test_zero(): + z = Integer(0) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is False + assert z.is_negative is False + assert z.is_nonpositive is True + assert z.is_nonnegative is True + assert z.is_even is True + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + assert z.is_number is True + + +def test_one(): + z = Integer(1) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is True + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_number is True + assert z.is_composite is False # issue 8807 + + +def test_negativeone(): + z = Integer(-1) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is False + assert z.is_negative is True + assert z.is_nonpositive is True + assert z.is_nonnegative is False + assert z.is_even is False + assert z.is_odd is True + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + assert z.is_number is True + + +def test_infinity(): + oo = S.Infinity + + assert oo.is_commutative is True + assert oo.is_integer is False + assert oo.is_rational is False + assert oo.is_algebraic is False + assert oo.is_transcendental is False + assert oo.is_extended_real is True + assert oo.is_real is False + assert oo.is_complex is False + assert oo.is_noninteger is True + assert oo.is_irrational is False + assert oo.is_imaginary is False + assert oo.is_nonzero is False + assert oo.is_positive is False + assert oo.is_negative is False + assert oo.is_nonpositive is False + assert oo.is_nonnegative is False + assert oo.is_extended_nonzero is True + assert oo.is_extended_positive is True + assert oo.is_extended_negative is False + assert oo.is_extended_nonpositive is False + assert oo.is_extended_nonnegative is True + assert oo.is_even is False + assert oo.is_odd is False + assert oo.is_finite is False + assert oo.is_infinite is True + assert oo.is_comparable is True + assert oo.is_prime is False + assert oo.is_composite is False + assert oo.is_number is True + + +def test_neg_infinity(): + mm = S.NegativeInfinity + + assert mm.is_commutative is True + assert mm.is_integer is False + assert mm.is_rational is False + assert mm.is_algebraic is False + assert mm.is_transcendental is False + assert mm.is_extended_real is True + assert mm.is_real is False + assert mm.is_complex is False + assert mm.is_noninteger is True + assert mm.is_irrational is False + assert mm.is_imaginary is False + assert mm.is_nonzero is False + assert mm.is_positive is False + assert mm.is_negative is False + assert mm.is_nonpositive is False + assert mm.is_nonnegative is False + assert mm.is_extended_nonzero is True + assert mm.is_extended_positive is False + assert mm.is_extended_negative is True + assert mm.is_extended_nonpositive is True + assert mm.is_extended_nonnegative is False + assert mm.is_even is False + assert mm.is_odd is False + assert mm.is_finite is False + assert mm.is_infinite is True + assert mm.is_comparable is True + assert mm.is_prime is False + assert mm.is_composite is False + assert mm.is_number is True + + +def test_zoo(): + zoo = S.ComplexInfinity + assert zoo.is_complex is False + assert zoo.is_real is False + assert zoo.is_prime is False + + +def test_nan(): + nan = S.NaN + + assert nan.is_commutative is True + assert nan.is_integer is None + assert nan.is_rational is None + assert nan.is_algebraic is None + assert nan.is_transcendental is None + assert nan.is_real is None + assert nan.is_complex is None + assert nan.is_noninteger is None + assert nan.is_irrational is None + assert nan.is_imaginary is None + assert nan.is_positive is None + assert nan.is_negative is None + assert nan.is_nonpositive is None + assert nan.is_nonnegative is None + assert nan.is_even is None + assert nan.is_odd is None + assert nan.is_finite is None + assert nan.is_infinite is None + assert nan.is_comparable is False + assert nan.is_prime is None + assert nan.is_composite is None + assert nan.is_number is True + + +def test_pos_rational(): + r = Rational(3, 4) + assert r.is_commutative is True + assert r.is_integer is False + assert r.is_rational is True + assert r.is_algebraic is True + assert r.is_transcendental is False + assert r.is_real is True + assert r.is_complex is True + assert r.is_noninteger is True + assert r.is_irrational is False + assert r.is_imaginary is False + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonpositive is False + assert r.is_nonnegative is True + assert r.is_even is False + assert r.is_odd is False + assert r.is_finite is True + assert r.is_infinite is False + assert r.is_comparable is True + assert r.is_prime is False + assert r.is_composite is False + + r = Rational(1, 4) + assert r.is_nonpositive is False + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonnegative is True + r = Rational(5, 4) + assert r.is_negative is False + assert r.is_positive is True + assert r.is_nonpositive is False + assert r.is_nonnegative is True + r = Rational(5, 3) + assert r.is_nonnegative is True + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonpositive is False + + +def test_neg_rational(): + r = Rational(-3, 4) + assert r.is_positive is False + assert r.is_nonpositive is True + assert r.is_negative is True + assert r.is_nonnegative is False + r = Rational(-1, 4) + assert r.is_nonpositive is True + assert r.is_positive is False + assert r.is_negative is True + assert r.is_nonnegative is False + r = Rational(-5, 4) + assert r.is_negative is True + assert r.is_positive is False + assert r.is_nonpositive is True + assert r.is_nonnegative is False + r = Rational(-5, 3) + assert r.is_nonnegative is False + assert r.is_positive is False + assert r.is_negative is True + assert r.is_nonpositive is True + + +def test_pi(): + z = S.Pi + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is False + assert z.is_transcendental is True + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is True + assert z.is_irrational is True + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + + +def test_E(): + z = S.Exp1 + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is False + assert z.is_transcendental is True + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is True + assert z.is_irrational is True + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + + +def test_I(): + z = S.ImaginaryUnit + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is False + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is True + assert z.is_positive is False + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is False + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is False + assert z.is_prime is False + assert z.is_composite is False + + +def test_symbol_real_false(): + # issue 3848 + a = Symbol('a', real=False) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_zero is False + + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_nonzero is False + + assert a.is_extended_negative is None + assert a.is_extended_positive is None + assert a.is_extended_nonnegative is None + assert a.is_extended_nonpositive is None + assert a.is_extended_nonzero is None + + +def test_symbol_extended_real_false(): + # issue 3848 + a = Symbol('a', extended_real=False) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_zero is False + + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_nonzero is False + + assert a.is_extended_negative is False + assert a.is_extended_positive is False + assert a.is_extended_nonnegative is False + assert a.is_extended_nonpositive is False + assert a.is_extended_nonzero is False + + +def test_symbol_imaginary(): + a = Symbol('a', imaginary=True) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_zero is False + assert a.is_nonzero is False # since nonzero -> real + + +def test_symbol_zero(): + x = Symbol('x', zero=True) + assert x.is_positive is False + assert x.is_nonpositive + assert x.is_negative is False + assert x.is_nonnegative + assert x.is_zero is True + # TODO Change to x.is_nonzero is None + # See https://github.com/sympy/sympy/pull/9583 + assert x.is_nonzero is False + assert x.is_finite is True + + +def test_symbol_positive(): + x = Symbol('x', positive=True) + assert x.is_positive is True + assert x.is_nonpositive is False + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_neg_symbol_positive(): + x = -Symbol('x', positive=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is True + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_symbol_nonpositive(): + x = Symbol('x', nonpositive=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_nonpositive(): + x = -Symbol('x', nonpositive=True) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive(): + x = Symbol('x', positive=False) + assert x.is_positive is False + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive_mul(): + # To test pull request 9379 + # Explicit handling of arg.is_positive=False was added to Mul._eval_is_positive + x = 2*Symbol('x', positive=False) + assert x.is_positive is False # This was None before + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +@XFAIL +def test_symbol_infinitereal_mul(): + ix = Symbol('ix', infinite=True, extended_real=True) + assert (-ix).is_extended_positive is None + + +def test_neg_symbol_falsepositive(): + x = -Symbol('x', positive=False) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_falsenegative(): + # To test pull request 9379 + # Explicit handling of arg.is_negative=False was added to Mul._eval_is_positive + x = -Symbol('x', negative=False) + assert x.is_positive is False # This was None before + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive_real(): + x = Symbol('x', positive=False, real=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_falsepositive_real(): + x = -Symbol('x', positive=False, real=True) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsenonnegative(): + x = Symbol('x', nonnegative=False) + assert x.is_positive is False + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is None + + +@XFAIL +def test_neg_symbol_falsenonnegative(): + x = -Symbol('x', nonnegative=False) + assert x.is_positive is None + assert x.is_nonpositive is False # this currently returns None + assert x.is_negative is False # this currently returns None + assert x.is_nonnegative is None + assert x.is_zero is False # this currently returns None + assert x.is_nonzero is True # this currently returns None + + +def test_symbol_falsenonnegative_real(): + x = Symbol('x', nonnegative=False, real=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is True + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_neg_symbol_falsenonnegative_real(): + x = -Symbol('x', nonnegative=False, real=True) + assert x.is_positive is True + assert x.is_nonpositive is False + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_prime(): + assert S.NegativeOne.is_prime is False + assert S(-2).is_prime is False + assert S(-4).is_prime is False + assert S.Zero.is_prime is False + assert S.One.is_prime is False + assert S(2).is_prime is True + assert S(17).is_prime is True + assert S(4).is_prime is False + + +def test_composite(): + assert S.NegativeOne.is_composite is False + assert S(-2).is_composite is False + assert S(-4).is_composite is False + assert S.Zero.is_composite is False + assert S(2).is_composite is False + assert S(17).is_composite is False + assert S(4).is_composite is True + x = Dummy(integer=True, positive=True, prime=False) + assert x.is_composite is None # x could be 1 + assert (x + 1).is_composite is None + x = Dummy(positive=True, even=True, prime=False) + assert x.is_integer is True + assert x.is_composite is True + + +def test_prime_symbol(): + x = Symbol('x', prime=True) + assert x.is_prime is True + assert x.is_integer is True + assert x.is_positive is True + assert x.is_negative is False + assert x.is_nonpositive is False + assert x.is_nonnegative is True + + x = Symbol('x', prime=False) + assert x.is_prime is False + assert x.is_integer is None + assert x.is_positive is None + assert x.is_negative is None + assert x.is_nonpositive is None + assert x.is_nonnegative is None + + +def test_symbol_noncommutative(): + x = Symbol('x', commutative=True) + assert x.is_complex is None + + x = Symbol('x', commutative=False) + assert x.is_integer is False + assert x.is_rational is False + assert x.is_algebraic is False + assert x.is_irrational is False + assert x.is_real is False + assert x.is_complex is False + + +def test_other_symbol(): + x = Symbol('x', integer=True) + assert x.is_integer is True + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', integer=True, nonnegative=True) + assert x.is_integer is True + assert x.is_nonnegative is True + assert x.is_negative is False + assert x.is_positive is None + assert x.is_finite is True + + x = Symbol('x', integer=True, nonpositive=True) + assert x.is_integer is True + assert x.is_nonpositive is True + assert x.is_positive is False + assert x.is_negative is None + assert x.is_finite is True + + x = Symbol('x', odd=True) + assert x.is_odd is True + assert x.is_even is False + assert x.is_integer is True + assert x.is_finite is True + + x = Symbol('x', odd=False) + assert x.is_odd is False + assert x.is_even is None + assert x.is_integer is None + assert x.is_finite is None + + x = Symbol('x', even=True) + assert x.is_even is True + assert x.is_odd is False + assert x.is_integer is True + assert x.is_finite is True + + x = Symbol('x', even=False) + assert x.is_even is False + assert x.is_odd is None + assert x.is_integer is None + assert x.is_finite is None + + x = Symbol('x', integer=True, nonnegative=True) + assert x.is_integer is True + assert x.is_nonnegative is True + assert x.is_finite is True + + x = Symbol('x', integer=True, nonpositive=True) + assert x.is_integer is True + assert x.is_nonpositive is True + assert x.is_finite is True + + x = Symbol('x', rational=True) + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', rational=False) + assert x.is_real is None + assert x.is_finite is None + + x = Symbol('x', irrational=True) + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', irrational=False) + assert x.is_real is None + assert x.is_finite is None + + with raises(AttributeError): + x.is_real = False + + x = Symbol('x', algebraic=True) + assert x.is_transcendental is False + x = Symbol('x', transcendental=True) + assert x.is_algebraic is False + assert x.is_rational is False + assert x.is_integer is False + + +def test_evaluate_false(): + # Previously this failed because the assumptions query would make new + # expressions and some of the evaluation logic would fail under + # evaluate(False). + from sympy.core.parameters import evaluate + from sympy.abc import x, h + f = 2**x**7 + with evaluate(False): + fh = f.xreplace({x: x+h}) + assert fh.exp.is_rational is None + + +def test_issue_3825(): + """catch: hash instability""" + x = Symbol("x") + y = Symbol("y") + a1 = x + y + a2 = y + x + a2.is_comparable + + h1 = hash(a1) + h2 = hash(a2) + assert h1 == h2 + + +def test_issue_4822(): + z = (-1)**Rational(1, 3)*(1 - I*sqrt(3)) + assert z.is_real in [True, None] + + +def test_hash_vs_typeinfo(): + """seemingly different typeinfo, but in fact equal""" + + # the following two are semantically equal + x1 = Symbol('x', even=True) + x2 = Symbol('x', integer=True, odd=False) + + assert hash(x1) == hash(x2) + assert x1 == x2 + + +def test_hash_vs_typeinfo_2(): + """different typeinfo should mean !eq""" + # the following two are semantically different + x = Symbol('x') + x1 = Symbol('x', even=True) + + assert x != x1 + assert hash(x) != hash(x1) # This might fail with very low probability + + +def test_hash_vs_eq(): + """catch: different hash for equal objects""" + a = 1 + S.Pi # important: do not fold it into a Number instance + ha = hash(a) # it should be Add/Mul/... to trigger the bug + + a.is_positive # this uses .evalf() and deduces it is positive + assert a.is_positive is True + + # be sure that hash stayed the same + assert ha == hash(a) + + # now b should be the same expression + b = a.expand(trig=True) + hb = hash(b) + + assert a == b + assert ha == hb + + +def test_Add_is_pos_neg(): + # these cover lines not covered by the rest of tests in core + n = Symbol('n', extended_negative=True, infinite=True) + nn = Symbol('n', extended_nonnegative=True, infinite=True) + np = Symbol('n', extended_nonpositive=True, infinite=True) + p = Symbol('p', extended_positive=True, infinite=True) + r = Dummy(extended_real=True, finite=False) + x = Symbol('x') + xf = Symbol('xf', finite=True) + assert (n + p).is_extended_positive is None + assert (n + x).is_extended_positive is None + assert (p + x).is_extended_positive is None + assert (n + p).is_extended_negative is None + assert (n + x).is_extended_negative is None + assert (p + x).is_extended_negative is None + + assert (n + xf).is_extended_positive is False + assert (p + xf).is_extended_positive is True + assert (n + xf).is_extended_negative is True + assert (p + xf).is_extended_negative is False + + assert (x - S.Infinity).is_extended_negative is None # issue 7798 + # issue 8046, 16.2 + assert (p + nn).is_extended_positive + assert (n + np).is_extended_negative + assert (p + r).is_extended_positive is None + + +def test_Add_is_imaginary(): + nn = Dummy(nonnegative=True) + assert (I*nn + I).is_imaginary # issue 8046, 17 + + +def test_Add_is_algebraic(): + a = Symbol('a', algebraic=True) + b = Symbol('a', algebraic=True) + na = Symbol('na', algebraic=False) + nb = Symbol('nb', algebraic=False) + x = Symbol('x') + assert (a + b).is_algebraic + assert (na + nb).is_algebraic is None + assert (a + na).is_algebraic is False + assert (a + x).is_algebraic is None + assert (na + x).is_algebraic is None + + +def test_Mul_is_algebraic(): + a = Symbol('a', algebraic=True) + b = Symbol('b', algebraic=True) + na = Symbol('na', algebraic=False) + an = Symbol('an', algebraic=True, nonzero=True) + nb = Symbol('nb', algebraic=False) + x = Symbol('x') + assert (a*b).is_algebraic is True + assert (na*nb).is_algebraic is None + assert (a*na).is_algebraic is None + assert (an*na).is_algebraic is False + assert (a*x).is_algebraic is None + assert (na*x).is_algebraic is None + + +def test_Pow_is_algebraic(): + e = Symbol('e', algebraic=True) + + assert Pow(1, e, evaluate=False).is_algebraic + assert Pow(0, e, evaluate=False).is_algebraic + + a = Symbol('a', algebraic=True) + azf = Symbol('azf', algebraic=True, zero=False) + na = Symbol('na', algebraic=False) + ia = Symbol('ia', algebraic=True, irrational=True) + ib = Symbol('ib', algebraic=True, irrational=True) + r = Symbol('r', rational=True) + x = Symbol('x') + assert (a**2).is_algebraic is True + assert (a**r).is_algebraic is None + assert (azf**r).is_algebraic is True + assert (a**x).is_algebraic is None + assert (na**r).is_algebraic is None + assert (ia**r).is_algebraic is True + assert (ia**ib).is_algebraic is False + + assert (a**e).is_algebraic is None + + # Gelfond-Schneider constant: + assert Pow(2, sqrt(2), evaluate=False).is_algebraic is False + + assert Pow(S.GoldenRatio, sqrt(3), evaluate=False).is_algebraic is False + + # issue 8649 + t = Symbol('t', real=True, transcendental=True) + n = Symbol('n', integer=True) + assert (t**n).is_algebraic is None + assert (t**n).is_integer is None + + assert (pi**3).is_algebraic is False + r = Symbol('r', zero=True) + assert (pi**r).is_algebraic is True + + +def test_Mul_is_prime_composite(): + x = Symbol('x', positive=True, integer=True) + y = Symbol('y', positive=True, integer=True) + assert (x*y).is_prime is None + assert ( (x+1)*(y+1) ).is_prime is False + assert ( (x+1)*(y+1) ).is_composite is True + + x = Symbol('x', positive=True) + assert ( (x+1)*(y+1) ).is_prime is None + assert ( (x+1)*(y+1) ).is_composite is None + + +def test_Pow_is_pos_neg(): + z = Symbol('z', real=True) + w = Symbol('w', nonpositive=True) + + assert (S.NegativeOne**S(2)).is_positive is True + assert (S.One**z).is_positive is True + assert (S.NegativeOne**S(3)).is_positive is False + assert (S.Zero**S.Zero).is_positive is True # 0**0 is 1 + assert (w**S(3)).is_positive is False + assert (w**S(2)).is_positive is None + assert (I**2).is_positive is False + assert (I**4).is_positive is True + + # tests emerging from #16332 issue + p = Symbol('p', zero=True) + q = Symbol('q', zero=False, real=True) + j = Symbol('j', zero=False, even=True) + x = Symbol('x', zero=True) + y = Symbol('y', zero=True) + assert (p**q).is_positive is False + assert (p**q).is_negative is False + assert (p**j).is_positive is False + assert (x**y).is_positive is True # 0**0 + assert (x**y).is_negative is False + + +def test_Pow_is_prime_composite(): + x = Symbol('x', positive=True, integer=True) + y = Symbol('y', positive=True, integer=True) + assert (x**y).is_prime is None + assert ( x**(y+1) ).is_prime is False + assert ( x**(y+1) ).is_composite is None + assert ( (x+1)**(y+1) ).is_composite is True + assert ( (-x-1)**(2*y) ).is_composite is True + + x = Symbol('x', positive=True) + assert (x**y).is_prime is None + + +def test_Mul_is_infinite(): + x = Symbol('x') + f = Symbol('f', finite=True) + i = Symbol('i', infinite=True) + z = Dummy(zero=True) + nzf = Dummy(finite=True, zero=False) + from sympy.core.mul import Mul + assert (x*f).is_finite is None + assert (x*i).is_finite is None + assert (f*i).is_finite is None + assert (x*f*i).is_finite is None + assert (z*i).is_finite is None + assert (nzf*i).is_finite is False + assert (z*f).is_finite is True + assert Mul(0, f, evaluate=False).is_finite is True + assert Mul(0, i, evaluate=False).is_finite is None + + assert (x*f).is_infinite is None + assert (x*i).is_infinite is None + assert (f*i).is_infinite is None + assert (x*f*i).is_infinite is None + assert (z*i).is_infinite is S.NaN.is_infinite + assert (nzf*i).is_infinite is True + assert (z*f).is_infinite is False + assert Mul(0, f, evaluate=False).is_infinite is False + assert Mul(0, i, evaluate=False).is_infinite is S.NaN.is_infinite + + +def test_Add_is_infinite(): + x = Symbol('x') + f = Symbol('f', finite=True) + i = Symbol('i', infinite=True) + i2 = Symbol('i2', infinite=True) + z = Dummy(zero=True) + nzf = Dummy(finite=True, zero=False) + from sympy.core.add import Add + assert (x+f).is_finite is None + assert (x+i).is_finite is None + assert (f+i).is_finite is False + assert (x+f+i).is_finite is None + assert (z+i).is_finite is False + assert (nzf+i).is_finite is False + assert (z+f).is_finite is True + assert (i+i2).is_finite is None + assert Add(0, f, evaluate=False).is_finite is True + assert Add(0, i, evaluate=False).is_finite is False + + assert (x+f).is_infinite is None + assert (x+i).is_infinite is None + assert (f+i).is_infinite is True + assert (x+f+i).is_infinite is None + assert (z+i).is_infinite is True + assert (nzf+i).is_infinite is True + assert (z+f).is_infinite is False + assert (i+i2).is_infinite is None + assert Add(0, f, evaluate=False).is_infinite is False + assert Add(0, i, evaluate=False).is_infinite is True + + +def test_special_is_rational(): + i = Symbol('i', integer=True) + i2 = Symbol('i2', integer=True) + ni = Symbol('ni', integer=True, nonzero=True) + r = Symbol('r', rational=True) + rn = Symbol('r', rational=True, nonzero=True) + nr = Symbol('nr', irrational=True) + x = Symbol('x') + assert sqrt(3).is_rational is False + assert (3 + sqrt(3)).is_rational is False + assert (3*sqrt(3)).is_rational is False + assert exp(3).is_rational is False + assert exp(ni).is_rational is False + assert exp(rn).is_rational is False + assert exp(x).is_rational is None + assert exp(log(3), evaluate=False).is_rational is True + assert log(exp(3), evaluate=False).is_rational is True + assert log(3).is_rational is False + assert log(ni + 1).is_rational is False + assert log(rn + 1).is_rational is False + assert log(x).is_rational is None + assert (sqrt(3) + sqrt(5)).is_rational is None + assert (sqrt(3) + S.Pi).is_rational is False + assert (x**i).is_rational is None + assert (i**i).is_rational is True + assert (i**i2).is_rational is None + assert (r**i).is_rational is None + assert (r**r).is_rational is None + assert (r**x).is_rational is None + assert (nr**i).is_rational is None # issue 8598 + assert (nr**Symbol('z', zero=True)).is_rational + assert sin(1).is_rational is False + assert sin(ni).is_rational is False + assert sin(rn).is_rational is False + assert sin(x).is_rational is None + assert asin(r).is_rational is False + assert sin(asin(3), evaluate=False).is_rational is True + + +@XFAIL +def test_issue_6275(): + x = Symbol('x') + # both zero or both Muls...but neither "change would be very appreciated. + # This is similar to x/x => 1 even though if x = 0, it is really nan. + assert isinstance(x*0, type(0*S.Infinity)) + if 0*S.Infinity is S.NaN: + b = Symbol('b', finite=None) + assert (b*0).is_zero is None + + +def test_sanitize_assumptions(): + # issue 6666 + for cls in (Symbol, Dummy, Wild): + x = cls('x', real=1, positive=0) + assert x.is_real is True + assert x.is_positive is False + assert cls('', real=True, positive=None).is_positive is None + raises(ValueError, lambda: cls('', commutative=None)) + raises(ValueError, lambda: Symbol._sanitize({"commutative": None})) + + +def test_special_assumptions(): + e = -3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2 + assert simplify(e < 0) is S.false + assert simplify(e > 0) is S.false + assert (e == 0) is False # it's not a literal 0 + assert e.equals(0) is True + + +def test_inconsistent(): + # cf. issues 5795 and 5545 + raises(InconsistentAssumptions, lambda: Symbol('x', real=True, + commutative=False)) + + +def test_issue_6631(): + assert ((-1)**(I)).is_real is True + assert ((-1)**(I*2)).is_real is True + assert ((-1)**(I/2)).is_real is True + assert ((-1)**(I*S.Pi)).is_real is True + assert (I**(I + 2)).is_real is True + + +def test_issue_2730(): + assert (1/(1 + I)).is_real is False + + +def test_issue_4149(): + assert (3 + I).is_complex + assert (3 + I).is_imaginary is False + assert (3*I + S.Pi*I).is_imaginary + # as Zero.is_imaginary is False, see issue 7649 + y = Symbol('y', real=True) + assert (3*I + S.Pi*I + y*I).is_imaginary is None + p = Symbol('p', positive=True) + assert (3*I + S.Pi*I + p*I).is_imaginary + n = Symbol('n', negative=True) + assert (-3*I - S.Pi*I + n*I).is_imaginary + + i = Symbol('i', imaginary=True) + assert ([(i**a).is_imaginary for a in range(4)] == + [False, True, False, True]) + + # tests from the PR #7887: + e = S("-sqrt(3)*I/2 + 0.866025403784439*I") + assert e.is_real is False + assert e.is_imaginary + + +def test_issue_2920(): + n = Symbol('n', negative=True) + assert sqrt(n).is_imaginary + + +def test_issue_7899(): + x = Symbol('x', real=True) + assert (I*x).is_real is None + assert ((x - I)*(x - 1)).is_zero is None + assert ((x - I)*(x - 1)).is_real is None + + +@XFAIL +def test_issue_7993(): + x = Dummy(integer=True) + y = Dummy(noninteger=True) + assert (x - y).is_zero is False + + +def test_issue_8075(): + raises(InconsistentAssumptions, lambda: Dummy(zero=True, finite=False)) + raises(InconsistentAssumptions, lambda: Dummy(zero=True, infinite=True)) + + +def test_issue_8642(): + x = Symbol('x', real=True, integer=False) + assert (x*2).is_integer is None, (x*2).is_integer + + +def test_issues_8632_8633_8638_8675_8992(): + p = Dummy(integer=True, positive=True) + nn = Dummy(integer=True, nonnegative=True) + assert (p - S.Half).is_positive + assert (p - 1).is_nonnegative + assert (nn + 1).is_positive + assert (-p + 1).is_nonpositive + assert (-nn - 1).is_negative + prime = Dummy(prime=True) + assert (prime - 2).is_nonnegative + assert (prime - 3).is_nonnegative is None + even = Dummy(positive=True, even=True) + assert (even - 2).is_nonnegative + + p = Dummy(positive=True) + assert (p/(p + 1) - 1).is_negative + assert ((p + 2)**3 - S.Half).is_positive + n = Dummy(negative=True) + assert (n - 3).is_nonpositive + + +def test_issue_9115_9150(): + n = Dummy('n', integer=True, nonnegative=True) + assert (factorial(n) >= 1) == True + assert (factorial(n) < 1) == False + + assert factorial(n + 1).is_even is None + assert factorial(n + 2).is_even is True + assert factorial(n + 2) >= 2 + + +def test_issue_9165(): + z = Symbol('z', zero=True) + f = Symbol('f', finite=False) + assert 0/z is S.NaN + assert 0*(1/z) is S.NaN + assert 0*f is S.NaN + + +def test_issue_10024(): + x = Dummy('x') + assert Mod(x, 2*pi).is_zero is None + + +def test_issue_10302(): + x = Symbol('x') + r = Symbol('r', real=True) + u = -(3*2**pi)**(1/pi) + 2*3**(1/pi) + i = u + u*I + + assert i.is_real is None # w/o simplification this should fail + assert (u + i).is_zero is None + assert (1 + i).is_zero is False + + a = Dummy('a', zero=True) + assert (a + I).is_zero is False + assert (a + r*I).is_zero is None + assert (a + I).is_imaginary + assert (a + x + I).is_imaginary is None + assert (a + r*I + I).is_imaginary is None + + +def test_complex_reciprocal_imaginary(): + assert (1 / (4 + 3*I)).is_imaginary is False + + +def test_issue_16313(): + x = Symbol('x', extended_real=False) + k = Symbol('k', real=True) + l = Symbol('l', real=True, zero=False) + assert (-x).is_real is False + assert (k*x).is_real is None # k can be zero also + assert (l*x).is_real is False + assert (l*x*x).is_real is None # since x*x can be a real number + assert (-x).is_positive is False + + +def test_issue_16579(): + # extended_real -> finite | infinite + x = Symbol('x', extended_real=True, infinite=False) + y = Symbol('y', extended_real=True, finite=False) + assert x.is_finite is True + assert y.is_infinite is True + + # With PR 16978, complex now implies finite + c = Symbol('c', complex=True) + assert c.is_finite is True + raises(InconsistentAssumptions, lambda: Dummy(complex=True, finite=False)) + + # Now infinite == !finite + nf = Symbol('nf', finite=False) + assert nf.is_infinite is True + + +def test_issue_17556(): + z = I*oo + assert z.is_imaginary is False + assert z.is_finite is False + + +def test_issue_21651(): + k = Symbol('k', positive=True, integer=True) + exp = 2*2**(-k) + assert exp.is_integer is None + + +def test_assumptions_copy(): + assert assumptions(Symbol('x'), {"commutative": True} + ) == {'commutative': True} + assert assumptions(Symbol('x'), ['integer']) == {} + assert assumptions(Symbol('x'), ['commutative'] + ) == {'commutative': True} + assert assumptions(Symbol('x')) == {'commutative': True} + assert assumptions(1)['positive'] + assert assumptions(3 + I) == { + 'algebraic': True, + 'commutative': True, + 'complex': True, + 'composite': False, + 'even': False, + 'extended_negative': False, + 'extended_nonnegative': False, + 'extended_nonpositive': False, + 'extended_nonzero': False, + 'extended_positive': False, + 'extended_real': False, + 'finite': True, + 'imaginary': False, + 'infinite': False, + 'integer': False, + 'irrational': False, + 'negative': False, + 'noninteger': False, + 'nonnegative': False, + 'nonpositive': False, + 'nonzero': False, + 'odd': False, + 'positive': False, + 'prime': False, + 'rational': False, + 'real': False, + 'transcendental': False, + 'zero': False} + + +def test_check_assumptions(): + assert check_assumptions(1, 0) is False + x = Symbol('x', positive=True) + assert check_assumptions(1, x) is True + assert check_assumptions(1, 1) is True + assert check_assumptions(-1, 1) is False + i = Symbol('i', integer=True) + # don't know if i is positive (or prime, etc...) + assert check_assumptions(i, 1) is None + assert check_assumptions(Dummy(integer=None), integer=True) is None + assert check_assumptions(Dummy(integer=None), integer=False) is None + assert check_assumptions(Dummy(integer=False), integer=True) is False + assert check_assumptions(Dummy(integer=True), integer=False) is False + # no T/F assumptions to check + assert check_assumptions(Dummy(integer=False), integer=None) is True + raises(ValueError, lambda: check_assumptions(2*x, x, positive=True)) + + +def test_failing_assumptions(): + x = Symbol('x', positive=True) + y = Symbol('y') + assert failing_assumptions(6*x + y, **x.assumptions0) == \ + {'real': None, 'imaginary': None, 'complex': None, 'hermitian': None, + 'positive': None, 'nonpositive': None, 'nonnegative': None, 'nonzero': None, + 'negative': None, 'zero': None, 'extended_real': None, 'finite': None, + 'infinite': None, 'extended_negative': None, 'extended_nonnegative': None, + 'extended_nonpositive': None, 'extended_nonzero': None, + 'extended_positive': None } + + +def test_common_assumptions(): + assert common_assumptions([0, 1, 2] + ) == {'algebraic': True, 'irrational': False, 'hermitian': + True, 'extended_real': True, 'real': True, 'extended_negative': + False, 'extended_nonnegative': True, 'integer': True, + 'rational': True, 'imaginary': False, 'complex': True, + 'commutative': True,'noninteger': False, 'composite': False, + 'infinite': False, 'nonnegative': True, 'finite': True, + 'transcendental': False,'negative': False} + assert common_assumptions([0, 1, 2], 'positive integer'.split() + ) == {'integer': True} + assert common_assumptions([0, 1, 2], []) == {} + assert common_assumptions([], ['integer']) == {} + assert common_assumptions([0], ['integer']) == {'integer': True} + +def test_pre_generated_assumption_rules_are_valid(): + # check the pre-generated assumptions match freshly generated assumptions + # if this check fails, consider updating the assumptions + # see sympy.core.assumptions._generate_assumption_rules + pre_generated_assumptions =_load_pre_generated_assumption_rules() + generated_assumptions =_generate_assumption_rules() + assert pre_generated_assumptions._to_python() == generated_assumptions._to_python(), "pre-generated assumptions are invalid, see sympy.core.assumptions._generate_assumption_rules" + + +def test_ask_shuffle(): + grp = PermutationGroup(Permutation(1, 0, 2), Permutation(2, 1, 3)) + + seed(123) + first = grp.random() + seed(123) + simplify(I) + second = grp.random() + seed(123) + simplify(-I) + third = grp.random() + + assert first == second == third diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_basic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_basic.py new file mode 100644 index 0000000000000000000000000000000000000000..3a7adbb5dcf0d70089ff79028afa943b24ee0c42 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_basic.py @@ -0,0 +1,343 @@ +"""This tests sympy/core/basic.py with (ideally) no reference to subclasses +of Basic or Atom.""" +import collections +from typing import TypeVar, Generic + +from sympy.assumptions.ask import Q +from sympy.core.basic import (Basic, Atom, as_Basic, + _atomic, _aresame) +from sympy.core.containers import Tuple +from sympy.core.function import Function, Lambda +from sympy.core.numbers import I, pi, Float +from sympy.core.singleton import S +from sympy.core.symbol import symbols, Symbol, Dummy +from sympy.concrete.summations import Sum +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.gamma_functions import gamma +from sympy.integrals.integrals import Integral +from sympy.functions.elementary.exponential import exp +from sympy.testing.pytest import raises, warns_deprecated_sympy +from sympy.functions.elementary.complexes import Abs, sign +from sympy.functions.elementary.piecewise import Piecewise +from sympy.core.relational import Eq + +b1 = Basic() +b2 = Basic(b1) +b3 = Basic(b2) +b21 = Basic(b2, b1) +T = TypeVar('T') + + +def test__aresame(): + assert not _aresame(Basic(Tuple()), Basic()) + for i, j in [(S(2), S(2.)), (1., Float(1))]: + for do in range(2): + assert not _aresame(Basic(i), Basic(j)) + assert not _aresame(i, j) + i, j = j, i + + +def test_structure(): + assert b21.args == (b2, b1) + assert b21.func(*b21.args) == b21 + assert bool(b1) + + +def test_immutable(): + assert not hasattr(b1, '__dict__') + with raises(AttributeError): + b1.x = 1 + + +def test_equality(): + instances = [b1, b2, b3, b21, Basic(b1, b1, b1), Basic] + for i, b_i in enumerate(instances): + for j, b_j in enumerate(instances): + assert (b_i == b_j) == (i == j) + assert (b_i != b_j) == (i != j) + + assert Basic() != [] + assert not(Basic() == []) + assert Basic() != 0 + assert not(Basic() == 0) + + class Foo: + """ + Class that is unaware of Basic, and relies on both classes returning + the NotImplemented singleton for equivalence to evaluate to False. + + """ + + b = Basic() + foo = Foo() + + assert b != foo + assert foo != b + assert not b == foo + assert not foo == b + + class Bar: + """ + Class that considers itself equal to any instance of Basic, and relies + on Basic returning the NotImplemented singleton in order to achieve + a symmetric equivalence relation. + + """ + def __eq__(self, other): + if isinstance(other, Basic): + return True + return NotImplemented + + def __ne__(self, other): + return not self == other + + bar = Bar() + + assert b == bar + assert bar == b + assert not b != bar + assert not bar != b + + +def test_matches_basic(): + instances = [Basic(b1, b1, b2), Basic(b1, b2, b1), Basic(b2, b1, b1), + Basic(b1, b2), Basic(b2, b1), b2, b1] + for i, b_i in enumerate(instances): + for j, b_j in enumerate(instances): + if i == j: + assert b_i.matches(b_j) == {} + else: + assert b_i.matches(b_j) is None + assert b1.match(b1) == {} + + +def test_has(): + assert b21.has(b1) + assert b21.has(b3, b1) + assert b21.has(Basic) + assert not b1.has(b21, b3) + assert not b21.has() + assert not b21.has(str) + assert not Symbol("x").has("x") + + +def test_subs(): + assert b21.subs(b2, b1) == Basic(b1, b1) + assert b21.subs(b2, b21) == Basic(b21, b1) + assert b3.subs(b2, b1) == b2 + + assert b21.subs([(b2, b1), (b1, b2)]) == Basic(b2, b2) + + assert b21.subs({b1: b2, b2: b1}) == Basic(b2, b2) + assert b21.subs(collections.ChainMap({b1: b2}, {b2: b1})) == Basic(b2, b2) + assert b21.subs(collections.OrderedDict([(b2, b1), (b1, b2)])) == Basic(b2, b2) + + raises(ValueError, lambda: b21.subs('bad arg')) + raises(TypeError, lambda: b21.subs(b1, b2, b3)) + # dict(b1=foo) creates a string 'b1' but leaves foo unchanged; subs + # will convert the first to a symbol but will raise an error if foo + # cannot be sympified; sympification is strict if foo is not string + raises(TypeError, lambda: b21.subs(b1='bad arg')) + + assert Symbol("text").subs({"text": b1}) == b1 + assert Symbol("s").subs({"s": 1}) == 1 + + +def test_subs_with_unicode_symbols(): + expr = Symbol('var1') + replaced = expr.subs('var1', 'x') + assert replaced.name == 'x' + + replaced = expr.subs('var1', 'x') + assert replaced.name == 'x' + + +def test_atoms(): + assert b21.atoms() == {Basic()} + + +def test_free_symbols_empty(): + assert b21.free_symbols == set() + + +def test_doit(): + assert b21.doit() == b21 + assert b21.doit(deep=False) == b21 + + +def test_S(): + assert repr(S) == 'S' + + +def test_xreplace(): + assert b21.xreplace({b2: b1}) == Basic(b1, b1) + assert b21.xreplace({b2: b21}) == Basic(b21, b1) + assert b3.xreplace({b2: b1}) == b2 + assert Basic(b1, b2).xreplace({b1: b2, b2: b1}) == Basic(b2, b1) + assert Atom(b1).xreplace({b1: b2}) == Atom(b1) + assert Atom(b1).xreplace({Atom(b1): b2}) == b2 + raises(TypeError, lambda: b1.xreplace()) + raises(TypeError, lambda: b1.xreplace([b1, b2])) + for f in (exp, Function('f')): + assert f.xreplace({}) == f + assert f.xreplace({}, hack2=True) == f + assert f.xreplace({f: b1}) == b1 + assert f.xreplace({f: b1}, hack2=True) == b1 + + +def test_sorted_args(): + x = symbols('x') + assert b21._sorted_args == b21.args + raises(AttributeError, lambda: x._sorted_args) + +def test_call(): + x, y = symbols('x y') + # See the long history of this in issues 5026 and 5105. + + raises(TypeError, lambda: sin(x)({ x : 1, sin(x) : 2})) + raises(TypeError, lambda: sin(x)(1)) + + # No effect as there are no callables + assert sin(x).rcall(1) == sin(x) + assert (1 + sin(x)).rcall(1) == 1 + sin(x) + + # Effect in the presence of callables + l = Lambda(x, 2*x) + assert (l + x).rcall(y) == 2*y + x + assert (x**l).rcall(2) == x**4 + # TODO UndefinedFunction does not subclass Expr + #f = Function('f') + #assert (2*f)(x) == 2*f(x) + + assert (Q.real & Q.positive).rcall(x) == Q.real(x) & Q.positive(x) + + +def test_rewrite(): + x, y, z = symbols('x y z') + a, b = symbols('a b') + f1 = sin(x) + cos(x) + assert f1.rewrite(cos,exp) == exp(I*x)/2 + sin(x) + exp(-I*x)/2 + assert f1.rewrite([cos],sin) == sin(x) + sin(x + pi/2, evaluate=False) + f2 = sin(x) + cos(y)/gamma(z) + assert f2.rewrite(sin,exp) == -I*(exp(I*x) - exp(-I*x))/2 + cos(y)/gamma(z) + + assert f1.rewrite() == f1 + +def test_literal_evalf_is_number_is_zero_is_comparable(): + x = symbols('x') + f = Function('f') + + # issue 5033 + assert f.is_number is False + # issue 6646 + assert f(1).is_number is False + i = Integral(0, (x, x, x)) + # expressions that are symbolically 0 can be difficult to prove + # so in case there is some easy way to know if something is 0 + # it should appear in the is_zero property for that object; + # if is_zero is true evalf should always be able to compute that + # zero + assert i.n() == 0 + assert i.is_zero + assert i.is_number is False + assert i.evalf(2, strict=False) == 0 + + # issue 10268 + n = sin(1)**2 + cos(1)**2 - 1 + assert n.is_comparable is False + assert n.n(2).is_comparable is False + assert n.n(2).n(2).is_comparable + + +def test_as_Basic(): + assert as_Basic(1) is S.One + assert as_Basic(()) == Tuple() + raises(TypeError, lambda: as_Basic([])) + + +def test_atomic(): + g, h = map(Function, 'gh') + x = symbols('x') + assert _atomic(g(x + h(x))) == {g(x + h(x))} + assert _atomic(g(x + h(x)), recursive=True) == {h(x), x, g(x + h(x))} + assert _atomic(1) == set() + assert _atomic(Basic(S(1), S(2))) == set() + + +def test_as_dummy(): + u, v, x, y, z, _0, _1 = symbols('u v x y z _0 _1') + assert Lambda(x, x + 1).as_dummy() == Lambda(_0, _0 + 1) + assert Lambda(x, x + _0).as_dummy() == Lambda(_1, _0 + _1) + eq = (1 + Sum(x, (x, 1, x))) + ans = 1 + Sum(_0, (_0, 1, x)) + once = eq.as_dummy() + assert once == ans + twice = once.as_dummy() + assert twice == ans + assert Integral(x + _0, (x, x + 1), (_0, 1, 2) + ).as_dummy() == Integral(_0 + _1, (_0, x + 1), (_1, 1, 2)) + for T in (Symbol, Dummy): + d = T('x', real=True) + D = d.as_dummy() + assert D != d and D.func == Dummy and D.is_real is None + assert Dummy().as_dummy().is_commutative + assert Dummy(commutative=False).as_dummy().is_commutative is False + + +def test_canonical_variables(): + x, i0, i1 = symbols('x _:2') + assert Integral(x, (x, x + 1)).canonical_variables == {x: i0} + assert Integral(x, (x, x + 1), (i0, 1, 2)).canonical_variables == { + x: i0, i0: i1} + assert Integral(x, (x, x + i0)).canonical_variables == {x: i1} + + +def test_replace_exceptions(): + from sympy.core.symbol import Wild + x, y = symbols('x y') + e = (x**2 + x*y) + raises(TypeError, lambda: e.replace(sin, 2)) + b = Wild('b') + c = Wild('c') + raises(TypeError, lambda: e.replace(b*c, c.is_real)) + raises(TypeError, lambda: e.replace(b.is_real, 1)) + raises(TypeError, lambda: e.replace(lambda d: d.is_Number, 1)) + + +def test_ManagedProperties(): + # ManagedProperties is now deprecated. Here we do our best to check that if + # someone is using it then it does work in the way that it previously did + # but gives a deprecation warning. + from sympy.core.assumptions import ManagedProperties + + myclasses = [] + + class MyMeta(ManagedProperties): + def __init__(cls, *args, **kwargs): + myclasses.append('executed') + super().__init__(*args, **kwargs) + + code = """ +class MySubclass(Basic, metaclass=MyMeta): + pass +""" + with warns_deprecated_sympy(): + exec(code) + + assert myclasses == ['executed'] + + +def test_generic(): + # https://github.com/sympy/sympy/issues/25399 + class A(Symbol, Generic[T]): + pass + + class B(A[T]): + pass + + +def test_rewrite_abs(): + # https://github.com/sympy/sympy/issues/27323 + x = Symbol('x') + assert sign(x).rewrite(abs) == sign(x).rewrite(Abs) + assert sign(x).rewrite(abs) == Piecewise((0, Eq(x, 0)), (x / Abs(x), True)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_cache.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_cache.py new file mode 100644 index 0000000000000000000000000000000000000000..9124fca70718299252929a9923f335dde25256eb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_cache.py @@ -0,0 +1,91 @@ +import sys +from sympy.core.cache import cacheit, cached_property, lazy_function +from sympy.testing.pytest import raises + +def test_cacheit_doc(): + @cacheit + def testfn(): + "test docstring" + pass + + assert testfn.__doc__ == "test docstring" + assert testfn.__name__ == "testfn" + +def test_cacheit_unhashable(): + @cacheit + def testit(x): + return x + + assert testit(1) == 1 + assert testit(1) == 1 + a = {} + assert testit(a) == {} + a[1] = 2 + assert testit(a) == {1: 2} + +def test_cachit_exception(): + # Make sure the cache doesn't call functions multiple times when they + # raise TypeError + + a = [] + + @cacheit + def testf(x): + a.append(0) + raise TypeError + + raises(TypeError, lambda: testf(1)) + assert len(a) == 1 + + a.clear() + # Unhashable type + raises(TypeError, lambda: testf([])) + assert len(a) == 1 + + @cacheit + def testf2(x): + a.append(0) + raise TypeError("Error") + + a.clear() + raises(TypeError, lambda: testf2(1)) + assert len(a) == 1 + + a.clear() + # Unhashable type + raises(TypeError, lambda: testf2([])) + assert len(a) == 1 + +def test_cached_property(): + class A: + def __init__(self, value): + self.value = value + self.calls = 0 + + @cached_property + def prop(self): + self.calls = self.calls + 1 + return self.value + + a = A(2) + assert a.calls == 0 + assert a.prop == 2 + assert a.calls == 1 + assert a.prop == 2 + assert a.calls == 1 + b = A(None) + assert b.prop == None + + +def test_lazy_function(): + module_name='xmlrpc.client' + function_name = 'gzip_decode' + lazy = lazy_function(module_name, function_name) + assert lazy(b'') == b'' + assert module_name in sys.modules + assert function_name in str(lazy) + repr_lazy = repr(lazy) + assert 'LazyFunction' in repr_lazy + assert function_name in repr_lazy + + lazy = lazy_function('sympy.core.cache', 'cheap') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py new file mode 100644 index 0000000000000000000000000000000000000000..31d2bed07b21aa2fa489273dca9edfc9993cfd86 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py @@ -0,0 +1,6 @@ +from sympy.testing.pytest import warns_deprecated_sympy + +def test_compatibility_submodule(): + # Test the sympy.core.compatibility deprecation warning + with warns_deprecated_sympy(): + import sympy.core.compatibility # noqa:F401 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_complex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_complex.py new file mode 100644 index 0000000000000000000000000000000000000000..a607e0bdb4db859336aa30aa61f43bfb57d5df88 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_complex.py @@ -0,0 +1,226 @@ +from sympy.core.function import expand_complex +from sympy.core.numbers import (I, Integer, Rational, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (Abs, conjugate, im, re, sign) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.hyperbolic import (cosh, coth, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, cot, sin, tan) + +def test_complex(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + e = (a + I*b)*(a - I*b) + assert e.expand() == a**2 + b**2 + assert sqrt(I) == Pow(I, S.Half) + + +def test_conjugate(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + c = Symbol("c", imaginary=True) + d = Symbol("d", imaginary=True) + x = Symbol('x') + z = a + I*b + c + I*d + zc = a - I*b - c + I*d + assert conjugate(z) == zc + assert conjugate(exp(z)) == exp(zc) + assert conjugate(exp(I*x)) == exp(-I*conjugate(x)) + assert conjugate(z**5) == zc**5 + assert conjugate(abs(x)) == abs(x) + assert conjugate(sign(z)) == sign(zc) + assert conjugate(sin(z)) == sin(zc) + assert conjugate(cos(z)) == cos(zc) + assert conjugate(tan(z)) == tan(zc) + assert conjugate(cot(z)) == cot(zc) + assert conjugate(sinh(z)) == sinh(zc) + assert conjugate(cosh(z)) == cosh(zc) + assert conjugate(tanh(z)) == tanh(zc) + assert conjugate(coth(z)) == coth(zc) + + +def test_abs1(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + assert abs(a) == Abs(a) + assert abs(-a) == abs(a) + assert abs(a + I*b) == sqrt(a**2 + b**2) + + +def test_abs2(): + a = Symbol("a", real=False) + b = Symbol("b", real=False) + assert abs(a) != a + assert abs(-a) != a + assert abs(a + I*b) != sqrt(a**2 + b**2) + + +def test_evalc(): + x = Symbol("x", real=True) + y = Symbol("y", real=True) + z = Symbol("z") + assert ((x + I*y)**2).expand(complex=True) == x**2 + 2*I*x*y - y**2 + assert expand_complex(z**(2*I)) == (re((re(z) + I*im(z))**(2*I)) + + I*im((re(z) + I*im(z))**(2*I))) + assert expand_complex( + z**(2*I), deep=False) == I*im(z**(2*I)) + re(z**(2*I)) + + assert exp(I*x) != cos(x) + I*sin(x) + assert exp(I*x).expand(complex=True) == cos(x) + I*sin(x) + assert exp(I*x + y).expand(complex=True) == exp(y)*cos(x) + I*sin(x)*exp(y) + + assert sin(I*x).expand(complex=True) == I * sinh(x) + assert sin(x + I*y).expand(complex=True) == sin(x)*cosh(y) + \ + I * sinh(y) * cos(x) + + assert cos(I*x).expand(complex=True) == cosh(x) + assert cos(x + I*y).expand(complex=True) == cos(x)*cosh(y) - \ + I * sinh(y) * sin(x) + + assert tan(I*x).expand(complex=True) == tanh(x) * I + assert tan(x + I*y).expand(complex=True) == ( + sin(2*x)/(cos(2*x) + cosh(2*y)) + + I*sinh(2*y)/(cos(2*x) + cosh(2*y))) + + assert sinh(I*x).expand(complex=True) == I * sin(x) + assert sinh(x + I*y).expand(complex=True) == sinh(x)*cos(y) + \ + I * sin(y) * cosh(x) + + assert cosh(I*x).expand(complex=True) == cos(x) + assert cosh(x + I*y).expand(complex=True) == cosh(x)*cos(y) + \ + I * sin(y) * sinh(x) + + assert tanh(I*x).expand(complex=True) == tan(x) * I + assert tanh(x + I*y).expand(complex=True) == ( + (sinh(x)*cosh(x) + I*cos(y)*sin(y)) / + (sinh(x)**2 + cos(y)**2)).expand() + + +def test_pythoncomplex(): + x = Symbol("x") + assert 4j*x != 4*x*I + assert 4j*x == 4.0*x*I + assert 4.1j*x != 4*x*I + + +def test_rootcomplex(): + R = Rational + assert ((+1 + I)**R(1, 2)).expand( + complex=True) == 2**R(1, 4)*cos( pi/8) + 2**R(1, 4)*sin( pi/8)*I + assert ((-1 - I)**R(1, 2)).expand( + complex=True) == 2**R(1, 4)*cos(3*pi/8) - 2**R(1, 4)*sin(3*pi/8)*I + assert (sqrt(-10)*I).as_real_imag() == (-sqrt(10), 0) + + +def test_expand_inverse(): + assert (1/(1 + I)).expand(complex=True) == (1 - I)/2 + assert ((1 + 2*I)**(-2)).expand(complex=True) == (-3 - 4*I)/25 + assert ((1 + I)**(-8)).expand(complex=True) == Rational(1, 16) + + +def test_expand_complex(): + assert ((2 + 3*I)**10).expand(complex=True) == -341525 - 145668*I + # the following two tests are to ensure the SymPy uses an efficient + # algorithm for calculating powers of complex numbers. They should execute + # in something like 0.01s. + assert ((2 + 3*I)**1000).expand(complex=True) == \ + -81079464736246615951519029367296227340216902563389546989376269312984127074385455204551402940331021387412262494620336565547972162814110386834027871072723273110439771695255662375718498785908345629702081336606863762777939617745464755635193139022811989314881997210583159045854968310911252660312523907616129080027594310008539817935736331124833163907518549408018652090650537035647520296539436440394920287688149200763245475036722326561143851304795139005599209239350981457301460233967137708519975586996623552182807311159141501424576682074392689622074945519232029999 + \ + 46938745946789557590804551905243206242164799136976022474337918748798900569942573265747576032611189047943842446167719177749107138603040963603119861476016947257034472364028585381714774667326478071264878108114128915685688115488744955550920239128462489496563930809677159214598114273887061533057125164518549173898349061972857446844052995037423459472376202251620778517659247970283904820245958198842631651569984310559418135975795868314764489884749573052997832686979294085577689571149679540256349988338406458116270429842222666345146926395233040564229555893248370000*I + assert ((2 + 3*I/4)**1000).expand(complex=True) == \ + Integer(1)*37079892761199059751745775382463070250205990218394308874593455293485167797989691280095867197640410033222367257278387021789651672598831503296531725827158233077451476545928116965316544607115843772405184272449644892857783761260737279675075819921259597776770965829089907990486964515784097181964312256560561065607846661496055417619388874421218472707497847700629822858068783288579581649321248495739224020822198695759609598745114438265083593711851665996586461937988748911532242908776883696631067311443171682974330675406616373422505939887984366289623091300746049101284856530270685577940283077888955692921951247230006346681086274961362500646889925803654263491848309446197554307105991537357310209426736453173441104334496173618419659521888945605315751089087820455852582920963561495787655250624781448951403353654348109893478206364632640344111022531861683064175862889459084900614967785405977231549003280842218501570429860550379522498497412180001/114813069527425452423283320117768198402231770208869520047764273682576626139237031385665948631650626991844596463898746277344711896086305533142593135616665318539129989145312280000688779148240044871428926990063486244781615463646388363947317026040466353970904996558162398808944629605623311649536164221970332681344168908984458505602379484807914058900934776500429002716706625830522008132236281291761267883317206598995396418127021779858404042159853183251540889433902091920554957783589672039160081957216630582755380425583726015528348786419432054508915275783882625175435528800822842770817965453762184851149029376 + \ + I*421638390580169706973991429333213477486930178424989246669892530737775352519112934278994501272111385966211392610029433824534634841747911783746811994443436271013377059560245191441549885048056920190833693041257216263519792201852046825443439142932464031501882145407459174948712992271510309541474392303461939389368955986650538525895866713074543004916049550090364398070215427272240155060576252568700906004691224321432509053286859100920489253598392100207663785243368195857086816912514025693453058403158416856847185079684216151337200057494966741268925263085619240941610301610538225414050394612058339070756009433535451561664522479191267503989904464718368605684297071150902631208673621618217106272361061676184840810762902463998065947687814692402219182668782278472952758690939877465065070481351343206840649517150634973307937551168752642148704904383991876969408056379195860410677814566225456558230131911142229028179902418223009651437985670625/1793954211366022694113801876840128100034871409513586250746316776290259783425578615401030447369541046747571819748417910583511123376348523955353017744010395602173906080395504375010762174191250701116076984219741972574712741619474818186676828531882286780795390571221287481389759837587864244524002565968286448146002639202882164150037179450123657170327105882819203167448541028601906377066191895183769810676831353109303069033234715310287563158747705988305326397404720186258671215368588625611876280581509852855552819149745718992630449787803625851701801184123166018366180137512856918294030710215034138299203584 + assert ((2 + 3*I)**-1000).expand(complex=True) == \ + Integer(1)*-81079464736246615951519029367296227340216902563389546989376269312984127074385455204551402940331021387412262494620336565547972162814110386834027871072723273110439771695255662375718498785908345629702081336606863762777939617745464755635193139022811989314881997210583159045854968310911252660312523907616129080027594310008539817935736331124833163907518549408018652090650537035647520296539436440394920287688149200763245475036722326561143851304795139005599209239350981457301460233967137708519975586996623552182807311159141501424576682074392689622074945519232029999/8777125472973511649630750050295188683351430110097915876250894978429797369155961290321829625004920141758416719066805645579710744290541337680113772670040386863849283653078324415471816788604945889094925784900885812724984087843737442111926413818245854362613018058774368703971604921858023116665586358870612944209398056562604561248859926344335598822815885851096698226775053153403320782439987679978321289537645645163767251396759519805603090332694449553371530571613352311006350058217982509738362083094920649452123351717366337410243853659113315547584871655479914439219520157174729130746351059075207407866012574386726064196992865627149566238044625779078186624347183905913357718850537058578084932880569701242598663149911276357125355850792073635533676541250531086757377369962506979378337216411188347761901006460813413505861461267545723590468627854202034450569581626648934062198718362303420281555886394558137408159453103395918783625713213314350531051312551733021627153081075080140680608080529736975658786227362251632725009435866547613598753584705455955419696609282059191031962604169242974038517575645939316377801594539335940001 - Integer(1)*46938745946789557590804551905243206242164799136976022474337918748798900569942573265747576032611189047943842446167719177749107138603040963603119861476016947257034472364028585381714774667326478071264878108114128915685688115488744955550920239128462489496563930809677159214598114273887061533057125164518549173898349061972857446844052995037423459472376202251620778517659247970283904820245958198842631651569984310559418135975795868314764489884749573052997832686979294085577689571149679540256349988338406458116270429842222666345146926395233040564229555893248370000*I/8777125472973511649630750050295188683351430110097915876250894978429797369155961290321829625004920141758416719066805645579710744290541337680113772670040386863849283653078324415471816788604945889094925784900885812724984087843737442111926413818245854362613018058774368703971604921858023116665586358870612944209398056562604561248859926344335598822815885851096698226775053153403320782439987679978321289537645645163767251396759519805603090332694449553371530571613352311006350058217982509738362083094920649452123351717366337410243853659113315547584871655479914439219520157174729130746351059075207407866012574386726064196992865627149566238044625779078186624347183905913357718850537058578084932880569701242598663149911276357125355850792073635533676541250531086757377369962506979378337216411188347761901006460813413505861461267545723590468627854202034450569581626648934062198718362303420281555886394558137408159453103395918783625713213314350531051312551733021627153081075080140680608080529736975658786227362251632725009435866547613598753584705455955419696609282059191031962604169242974038517575645939316377801594539335940001 + assert ((2 + 3*I/4)**-1000).expand(complex=True) == \ + Integer(1)*4257256305661027385394552848555894604806501409793288342610746813288539790051927148781268212212078237301273165351052934681382567968787279534591114913777456610214738290619922068269909423637926549603264174216950025398244509039145410016404821694746262142525173737175066432954496592560621330313807235750500564940782099283410261748370262433487444897446779072067625787246390824312580440138770014838135245148574339248259670887549732495841810961088930810608893772914812838358159009303794863047635845688453859317690488124382253918725010358589723156019888846606295866740117645571396817375322724096486161308083462637370825829567578309445855481578518239186117686659177284332344643124760453112513611749309168470605289172320376911472635805822082051716625171429727162039621902266619821870482519063133136820085579315127038372190224739238686708451840610064871885616258831386810233957438253532027049148030157164346719204500373766157143311767338973363806106967439378604898250533766359989107510507493549529158818602327525235240510049484816090584478644771183158342479140194633579061295740839490629457435283873180259847394582069479062820225159699506175855369539201399183443253793905149785994830358114153241481884290274629611529758663543080724574566578220908907477622643689220814376054314972190402285121776593824615083669045183404206291739005554569305329760211752815718335731118664756831942466773261465213581616104242113894521054475516019456867271362053692785300826523328020796670205463390909136593859765912483565093461468865534470710132881677639651348709376/2103100954337624833663208713697737151593634525061637972297915388685604042449504336765884978184588688426595940401280828953096857809292320006227881797146858511436638446932833617514351442216409828605662238790280753075176269765767010004889778647709740770757817960711900340755635772183674511158570690702969774966791073165467918123298694584729211212414462628433370481195120564586361368504153395406845170075275051749019600057116719726628746724489572189061061036426955163696859127711110719502594479795200686212257570291758725259007379710596548777812659422174199194837355646482046783616494013289495563083118517507178847555801163089723056310287760875135196081975602765511153122381201303871673391366630940702817360340900568748719988954847590748960761446218262344767250783946365392689256634180417145926390656439421745644011831124277463643383712803287985472471755648426749842410972650924240795946699346613614779460399530274263580007672855851663196114585312432954432654691485867618908420370875753749297487803461900447407917655296784879220450937110470920633595689721819488638484547259978337741496090602390463594556401615298457456112485536498177883358587125449801777718900375736758266215245325999241624148841915093787519330809347240990363802360596034171167818310322276373120180985148650099673289383722502488957717848531612020897298448601714154586319660314294591620415272119454982220034319689607295960162971300417552364254983071768070124456169427638371140064235083443242844616326538396503937972586505546495649094344512270582463639152160238137952390380581401171977159154009407415523525096743009110916334144716516647041176989758534635251844947906038080852185583742296318878233394998111078843229681030277039104786225656992262073797524057992347971177720807155842376332851559276430280477639539393920006008737472164850104411971830120295750221200029811143140323763349636629725073624360001 - Integer(1)*3098214262599218784594285246258841485430681674561917573155883806818465520660668045042109232930382494608383663464454841313154390741655282039877410154577448327874989496074260116195788919037407420625081798124301494353693248757853222257918294662198297114746822817460991242508743651430439120439020484502408313310689912381846149597061657483084652685283853595100434135149479564507015504022249330340259111426799121454516345905101620532787348293877485702600390665276070250119465888154331218827342488849948540687659846652377277250614246402784754153678374932540789808703029043827352976139228402417432199779415751301480406673762521987999573209628597459357964214510139892316208670927074795773830798600837815329291912002136924506221066071242281626618211060464126372574400100990746934953437169840312584285942093951405864225230033279614235191326102697164613004299868695519642598882914862568516635347204441042798206770888274175592401790040170576311989738272102077819127459014286741435419468254146418098278519775722104890854275995510700298782146199325790002255362719776098816136732897323406228294203133323296591166026338391813696715894870956511298793595675308998014158717167429941371979636895553724830981754579086664608880698350866487717403917070872269853194118364230971216854931998642990452908852258008095741042117326241406479532880476938937997238098399302185675832474590293188864060116934035867037219176916416481757918864533515526389079998129329045569609325290897577497835388451456680707076072624629697883854217331728051953671643278797380171857920000*I/2103100954337624833663208713697737151593634525061637972297915388685604042449504336765884978184588688426595940401280828953096857809292320006227881797146858511436638446932833617514351442216409828605662238790280753075176269765767010004889778647709740770757817960711900340755635772183674511158570690702969774966791073165467918123298694584729211212414462628433370481195120564586361368504153395406845170075275051749019600057116719726628746724489572189061061036426955163696859127711110719502594479795200686212257570291758725259007379710596548777812659422174199194837355646482046783616494013289495563083118517507178847555801163089723056310287760875135196081975602765511153122381201303871673391366630940702817360340900568748719988954847590748960761446218262344767250783946365392689256634180417145926390656439421745644011831124277463643383712803287985472471755648426749842410972650924240795946699346613614779460399530274263580007672855851663196114585312432954432654691485867618908420370875753749297487803461900447407917655296784879220450937110470920633595689721819488638484547259978337741496090602390463594556401615298457456112485536498177883358587125449801777718900375736758266215245325999241624148841915093787519330809347240990363802360596034171167818310322276373120180985148650099673289383722502488957717848531612020897298448601714154586319660314294591620415272119454982220034319689607295960162971300417552364254983071768070124456169427638371140064235083443242844616326538396503937972586505546495649094344512270582463639152160238137952390380581401171977159154009407415523525096743009110916334144716516647041176989758534635251844947906038080852185583742296318878233394998111078843229681030277039104786225656992262073797524057992347971177720807155842376332851559276430280477639539393920006008737472164850104411971830120295750221200029811143140323763349636629725073624360001 + + a = Symbol('a', real=True) + b = Symbol('b', real=True) + assert exp(a*(2 + I*b)).expand(complex=True) == \ + I*exp(2*a)*sin(a*b) + exp(2*a)*cos(a*b) + + +def test_expand(): + f = (16 - 2*sqrt(29))**2 + assert f.expand() == 372 - 64*sqrt(29) + f = (Integer(1)/2 + I/2)**10 + assert f.expand() == I/32 + f = (Integer(1)/2 + I)**10 + assert f.expand() == Integer(237)/1024 - 779*I/256 + + +def test_re_im1652(): + x = Symbol('x') + assert re(x) == re(conjugate(x)) + assert im(x) == - im(conjugate(x)) + assert im(x)*re(conjugate(x)) + im(conjugate(x)) * re(x) == 0 + + +def test_issue_5084(): + x = Symbol('x') + assert ((x + x*I)/(1 + I)).as_real_imag() == (re((x + I*x)/(1 + I) + ), im((x + I*x)/(1 + I))) + + +def test_issue_5236(): + assert (cos(1 + I)**3).as_real_imag() == (-3*sin(1)**2*sinh(1)**2*cos(1)*cosh(1) + + cos(1)**3*cosh(1)**3, -3*cos(1)**2*cosh(1)**2*sin(1)*sinh(1) + sin(1)**3*sinh(1)**3) + + +def test_real_imag(): + x, y, z = symbols('x, y, z') + X, Y, Z = symbols('X, Y, Z', commutative=False) + a = Symbol('a', real=True) + assert (2*a*x).as_real_imag() == (2*a*re(x), 2*a*im(x)) + + # issue 5395: + assert (x*x.conjugate()).as_real_imag() == (Abs(x)**2, 0) + assert im(x*x.conjugate()) == 0 + assert im(x*y.conjugate()*z*y) == im(x*z)*Abs(y)**2 + assert im(x*y.conjugate()*x*y) == im(x**2)*Abs(y)**2 + assert im(Z*y.conjugate()*X*y) == im(Z*X)*Abs(y)**2 + assert im(X*X.conjugate()) == im(X*X.conjugate(), evaluate=False) + assert (sin(x)*sin(x).conjugate()).as_real_imag() == \ + (Abs(sin(x))**2, 0) + + # issue 6573: + assert (x**2).as_real_imag() == (re(x)**2 - im(x)**2, 2*re(x)*im(x)) + + # issue 6428: + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + assert (i*r*x).as_real_imag() == (I*i*r*im(x), -I*i*r*re(x)) + assert (i*r*x*(y + 2)).as_real_imag() == ( + I*i*r*(re(y) + 2)*im(x) + I*i*r*re(x)*im(y), + -I*i*r*(re(y) + 2)*re(x) + I*i*r*im(x)*im(y)) + + # issue 7106: + assert ((1 + I)/(1 - I)).as_real_imag() == (0, 1) + assert ((1 + 2*I)*(1 + 3*I)).as_real_imag() == (-5, 5) + + +def test_pow_issue_1724(): + e = ((S.NegativeOne)**(S.One/3)) + assert e.conjugate().n() == e.n().conjugate() + e = S('-2/3 - (-29/54 + sqrt(93)/18)**(1/3) - 1/(9*(-29/54 + sqrt(93)/18)**(1/3))') + assert e.conjugate().n() == e.n().conjugate() + e = 2**I + assert e.conjugate().n() == e.n().conjugate() + + +def test_issue_5429(): + assert sqrt(I).conjugate() != sqrt(I) + +def test_issue_4124(): + from sympy.core.numbers import oo + assert expand_complex(I*oo) == oo*I + +def test_issue_11518(): + x = Symbol("x", real=True) + y = Symbol("y", real=True) + r = sqrt(x**2 + y**2) + assert conjugate(r) == r + s = abs(x + I * y) + assert conjugate(s) == r diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py new file mode 100644 index 0000000000000000000000000000000000000000..c199e24eddf8ef7c2a14e38d1ad2dc95e4acc0cc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py @@ -0,0 +1,87 @@ +from sympy.core.basic import Basic +from sympy.core.mul import Mul +from sympy.core.symbol import (Symbol, symbols) + +from sympy.testing.pytest import XFAIL + +class SymbolInMulOnce(Symbol): + # Test class for a symbol that can only appear once in a `Mul` expression. + pass + + +Basic._constructor_postprocessor_mapping[SymbolInMulOnce] = { + "Mul": [lambda x: x], + "Pow": [lambda x: x.base if isinstance(x.base, SymbolInMulOnce) else x], + "Add": [lambda x: x], +} + + +def _postprocess_SymbolRemovesOtherSymbols(expr): + args = tuple(i for i in expr.args if not isinstance(i, Symbol) or isinstance(i, SymbolRemovesOtherSymbols)) + if args == expr.args: + return expr + return Mul.fromiter(args) + + +class SymbolRemovesOtherSymbols(Symbol): + # Test class for a symbol that removes other symbols in `Mul`. + pass + +Basic._constructor_postprocessor_mapping[SymbolRemovesOtherSymbols] = { + "Mul": [_postprocess_SymbolRemovesOtherSymbols], +} + +class SubclassSymbolInMulOnce(SymbolInMulOnce): + pass + +class SubclassSymbolRemovesOtherSymbols(SymbolRemovesOtherSymbols): + pass + + +def test_constructor_postprocessors1(): + x = SymbolInMulOnce("x") + y = SymbolInMulOnce("y") + assert isinstance(3*x, Mul) + assert (3*x).args == (3, x) + assert x*x == x + assert 3*x*x == 3*x + assert 2*x*x + x == 3*x + assert x**3*y*y == x*y + assert x**5 + y*x**3 == x + x*y + + w = SymbolRemovesOtherSymbols("w") + assert x*w == w + assert (3*w).args == (3, w) + assert set((w + x).args) == {x, w} + +def test_constructor_postprocessors2(): + x = SubclassSymbolInMulOnce("x") + y = SubclassSymbolInMulOnce("y") + assert isinstance(3*x, Mul) + assert (3*x).args == (3, x) + assert x*x == x + assert 3*x*x == 3*x + assert 2*x*x + x == 3*x + assert x**3*y*y == x*y + assert x**5 + y*x**3 == x + x*y + + w = SubclassSymbolRemovesOtherSymbols("w") + assert x*w == w + assert (3*w).args == (3, w) + assert set((w + x).args) == {x, w} + + +@XFAIL +def test_subexpression_postprocessors(): + # The postprocessors used to work with subexpressions, but the + # functionality was removed. See #15948. + a = symbols("a") + x = SymbolInMulOnce("x") + w = SymbolRemovesOtherSymbols("w") + assert 3*a*w**2 == 3*w**2 + assert 3*a*x**3*w**2 == 3*w**2 + + x = SubclassSymbolInMulOnce("x") + w = SubclassSymbolRemovesOtherSymbols("w") + assert 3*a*w**2 == 3*w**2 + assert 3*a*x**3*w**2 == 3*w**2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_containers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_containers.py new file mode 100644 index 0000000000000000000000000000000000000000..23357b9f667fffc82d93b2b1adb42b495114c67e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_containers.py @@ -0,0 +1,217 @@ +from collections import defaultdict + +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.numbers import Integer +from sympy.core.kind import NumberKind +from sympy.matrices.kind import MatrixKind +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.core.sympify import sympify +from sympy.matrices.dense import Matrix +from sympy.sets.sets import FiniteSet +from sympy.core.containers import tuple_wrapper, TupleKind +from sympy.core.expr import unchanged +from sympy.core.function import Function, Lambda +from sympy.core.relational import Eq +from sympy.testing.pytest import raises +from sympy.utilities.iterables import is_sequence, iterable + +from sympy.abc import x, y + + +def test_Tuple(): + t = (1, 2, 3, 4) + st = Tuple(*t) + assert set(sympify(t)) == set(st) + assert len(t) == len(st) + assert set(sympify(t[:2])) == set(st[:2]) + assert isinstance(st[:], Tuple) + assert st == Tuple(1, 2, 3, 4) + assert st.func(*st.args) == st + p, q, r, s = symbols('p q r s') + t2 = (p, q, r, s) + st2 = Tuple(*t2) + assert st2.atoms() == set(t2) + assert st == st2.subs({p: 1, q: 2, r: 3, s: 4}) + # issue 5505 + assert all(isinstance(arg, Basic) for arg in st.args) + assert Tuple(p, 1).subs(p, 0) == Tuple(0, 1) + assert Tuple(p, Tuple(p, 1)).subs(p, 0) == Tuple(0, Tuple(0, 1)) + + assert Tuple(t2) == Tuple(Tuple(*t2)) + assert Tuple.fromiter(t2) == Tuple(*t2) + assert Tuple.fromiter(x for x in range(4)) == Tuple(0, 1, 2, 3) + assert st2.fromiter(st2.args) == st2 + + +def test_Tuple_contains(): + t1, t2 = Tuple(1), Tuple(2) + assert t1 in Tuple(1, 2, 3, t1, Tuple(t2)) + assert t2 not in Tuple(1, 2, 3, t1, Tuple(t2)) + + +def test_Tuple_concatenation(): + assert Tuple(1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + assert (1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + assert Tuple(1, 2) + (3, 4) == Tuple(1, 2, 3, 4) + raises(TypeError, lambda: Tuple(1, 2) + 3) + raises(TypeError, lambda: 1 + Tuple(2, 3)) + + #the Tuple case in __radd__ is only reached when a subclass is involved + class Tuple2(Tuple): + def __radd__(self, other): + return Tuple.__radd__(self, other + other) + assert Tuple(1, 2) + Tuple2(3, 4) == Tuple(1, 2, 1, 2, 3, 4) + assert Tuple2(1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + + +def test_Tuple_equality(): + assert not isinstance(Tuple(1, 2), tuple) + assert (Tuple(1, 2) == (1, 2)) is True + assert (Tuple(1, 2) != (1, 2)) is False + assert (Tuple(1, 2) == (1, 3)) is False + assert (Tuple(1, 2) != (1, 3)) is True + assert (Tuple(1, 2) == Tuple(1, 2)) is True + assert (Tuple(1, 2) != Tuple(1, 2)) is False + assert (Tuple(1, 2) == Tuple(1, 3)) is False + assert (Tuple(1, 2) != Tuple(1, 3)) is True + + +def test_Tuple_Eq(): + assert Eq(Tuple(), Tuple()) is S.true + assert Eq(Tuple(1), 1) is S.false + assert Eq(Tuple(1, 2), Tuple(1)) is S.false + assert Eq(Tuple(1), Tuple(1)) is S.true + assert Eq(Tuple(1, 2), Tuple(1, 3)) is S.false + assert Eq(Tuple(1, 2), Tuple(1, 2)) is S.true + assert unchanged(Eq, Tuple(1, x), Tuple(1, 2)) + assert Eq(Tuple(1, x), Tuple(1, 2)).subs(x, 2) is S.true + assert unchanged(Eq, Tuple(1, 2), x) + f = Function('f') + assert unchanged(Eq, Tuple(1), f(x)) + assert Eq(Tuple(1), f(x)).subs(x, 1).subs(f, Lambda(y, (y,))) is S.true + + +def test_Tuple_comparision(): + assert (Tuple(1, 3) >= Tuple(-10, 30)) is S.true + assert (Tuple(1, 3) <= Tuple(-10, 30)) is S.false + assert (Tuple(1, 3) >= Tuple(1, 3)) is S.true + assert (Tuple(1, 3) <= Tuple(1, 3)) is S.true + + +def test_Tuple_tuple_count(): + assert Tuple(0, 1, 2, 3).tuple_count(4) == 0 + assert Tuple(0, 4, 1, 2, 3).tuple_count(4) == 1 + assert Tuple(0, 4, 1, 4, 2, 3).tuple_count(4) == 2 + assert Tuple(0, 4, 1, 4, 2, 4, 3).tuple_count(4) == 3 + + +def test_Tuple_index(): + assert Tuple(4, 0, 1, 2, 3).index(4) == 0 + assert Tuple(0, 4, 1, 2, 3).index(4) == 1 + assert Tuple(0, 1, 4, 2, 3).index(4) == 2 + assert Tuple(0, 1, 2, 4, 3).index(4) == 3 + assert Tuple(0, 1, 2, 3, 4).index(4) == 4 + + raises(ValueError, lambda: Tuple(0, 1, 2, 3).index(4)) + raises(ValueError, lambda: Tuple(4, 0, 1, 2, 3).index(4, 1)) + raises(ValueError, lambda: Tuple(0, 1, 2, 3, 4).index(4, 1, 4)) + + +def test_Tuple_mul(): + assert Tuple(1, 2, 3)*2 == Tuple(1, 2, 3, 1, 2, 3) + assert 2*Tuple(1, 2, 3) == Tuple(1, 2, 3, 1, 2, 3) + assert Tuple(1, 2, 3)*Integer(2) == Tuple(1, 2, 3, 1, 2, 3) + assert Integer(2)*Tuple(1, 2, 3) == Tuple(1, 2, 3, 1, 2, 3) + + raises(TypeError, lambda: Tuple(1, 2, 3)*S.Half) + raises(TypeError, lambda: S.Half*Tuple(1, 2, 3)) + + +def test_tuple_wrapper(): + + @tuple_wrapper + def wrap_tuples_and_return(*t): + return t + + p = symbols('p') + assert wrap_tuples_and_return(p, 1) == (p, 1) + assert wrap_tuples_and_return((p, 1)) == (Tuple(p, 1),) + assert wrap_tuples_and_return(1, (p, 2), 3) == (1, Tuple(p, 2), 3) + + +def test_iterable_is_sequence(): + ordered = [[], (), Tuple(), Matrix([[]])] + unordered = [set()] + not_sympy_iterable = [{}, '', ''] + assert all(is_sequence(i) for i in ordered) + assert all(not is_sequence(i) for i in unordered) + assert all(iterable(i) for i in ordered + unordered) + assert all(not iterable(i) for i in not_sympy_iterable) + assert all(iterable(i, exclude=None) for i in not_sympy_iterable) + + +def test_TupleKind(): + kind = TupleKind(NumberKind, MatrixKind(NumberKind)) + assert Tuple(1, Matrix([1, 2])).kind is kind + assert Tuple(1, 2).kind is TupleKind(NumberKind, NumberKind) + assert Tuple(1, 2).kind.element_kind == (NumberKind, NumberKind) + + +def test_Dict(): + x, y, z = symbols('x y z') + d = Dict({x: 1, y: 2, z: 3}) + assert d[x] == 1 + assert d[y] == 2 + raises(KeyError, lambda: d[2]) + raises(KeyError, lambda: d['2']) + assert len(d) == 3 + assert set(d.keys()) == {x, y, z} + assert set(d.values()) == {S.One, S(2), S(3)} + assert d.get(5, 'default') == 'default' + assert d.get('5', 'default') == 'default' + assert x in d and z in d and 5 not in d and '5' not in d + assert d.has(x) and d.has(1) # SymPy Basic .has method + + # Test input types + # input - a Python dict + # input - items as args - SymPy style + assert (Dict({x: 1, y: 2, z: 3}) == + Dict((x, 1), (y, 2), (z, 3))) + + raises(TypeError, lambda: Dict(((x, 1), (y, 2), (z, 3)))) + with raises(NotImplementedError): + d[5] = 6 # assert immutability + + assert set( + d.items()) == {Tuple(x, S.One), Tuple(y, S(2)), Tuple(z, S(3))} + assert set(d) == {x, y, z} + assert str(d) == '{x: 1, y: 2, z: 3}' + assert d.__repr__() == '{x: 1, y: 2, z: 3}' + + # Test creating a Dict from a Dict. + d = Dict({x: 1, y: 2, z: 3}) + assert d == Dict(d) + + # Test for supporting defaultdict + d = defaultdict(int) + assert d[x] == 0 + assert d[y] == 0 + assert d[z] == 0 + assert Dict(d) + d = Dict(d) + assert len(d) == 3 + assert set(d.keys()) == {x, y, z} + assert set(d.values()) == {S.Zero, S.Zero, S.Zero} + + +def test_issue_5788(): + args = [(1, 2), (2, 1)] + for o in [Dict, Tuple, FiniteSet]: + # __eq__ and arg handling + if o != Tuple: + assert o(*args) == o(*reversed(args)) + pair = [o(*args), o(*reversed(args))] + assert sorted(pair) == sorted(pair) + assert set(o(*args)) # doesn't fail diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py new file mode 100644 index 0000000000000000000000000000000000000000..bc95004ef5ba4421927289a049a9197d208c30d0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py @@ -0,0 +1,155 @@ +from sympy.concrete.summations import Sum +from sympy.core.basic import Basic +from sympy.core.function import (Derivative, Function, count_ops) +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import (Eq, Rel) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (And, Equivalent, ITE, Implies, Nand, + Nor, Not, Or, Xor) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.core.containers import Tuple + +x, y, z = symbols('x,y,z') +a, b, c = symbols('a,b,c') + +def test_count_ops_non_visual(): + def count(val): + return count_ops(val, visual=False) + assert count(x) == 0 + assert count(x) is not S.Zero + assert count(x + y) == 1 + assert count(x + y) is not S.One + assert count(x + y*x + 2*y) == 4 + assert count({x + y: x}) == 1 + assert count({x + y: S(2) + x}) is not S.One + assert count(x < y) == 1 + assert count(Or(x,y)) == 1 + assert count(And(x,y)) == 1 + assert count(Not(x)) == 1 + assert count(Nor(x,y)) == 2 + assert count(Nand(x,y)) == 2 + assert count(Xor(x,y)) == 1 + assert count(Implies(x,y)) == 1 + assert count(Equivalent(x,y)) == 1 + assert count(ITE(x,y,z)) == 1 + assert count(ITE(True,x,y)) == 0 + + +def test_count_ops_visual(): + ADD, MUL, POW, SIN, COS, EXP, AND, D, G, M = symbols( + 'Add Mul Pow sin cos exp And Derivative Integral Sum'.upper()) + DIV, SUB, NEG = symbols('DIV SUB NEG') + LT, LE, GT, GE, EQ, NE = symbols('LT LE GT GE EQ NE') + NOT, OR, AND, XOR, IMPLIES, EQUIVALENT, _ITE, BASIC, TUPLE = symbols( + 'Not Or And Xor Implies Equivalent ITE Basic Tuple'.upper()) + + def count(val): + return count_ops(val, visual=True) + + assert count(7) is S.Zero + assert count(S(7)) is S.Zero + assert count(-1) == NEG + assert count(-2) == NEG + assert count(S(2)/3) == DIV + assert count(Rational(2, 3)) == DIV + assert count(pi/3) == DIV + assert count(-pi/3) == DIV + NEG + assert count(I - 1) == SUB + assert count(1 - I) == SUB + assert count(1 - 2*I) == SUB + MUL + + assert count(x) is S.Zero + assert count(-x) == NEG + assert count(-2*x/3) == NEG + DIV + MUL + assert count(Rational(-2, 3)*x) == NEG + DIV + MUL + assert count(1/x) == DIV + assert count(1/(x*y)) == DIV + MUL + assert count(-1/x) == NEG + DIV + assert count(-2/x) == NEG + DIV + assert count(x/y) == DIV + assert count(-x/y) == NEG + DIV + + assert count(x**2) == POW + assert count(-x**2) == POW + NEG + assert count(-2*x**2) == POW + MUL + NEG + + assert count(x + pi/3) == ADD + DIV + assert count(x + S.One/3) == ADD + DIV + assert count(x + Rational(1, 3)) == ADD + DIV + assert count(x + y) == ADD + assert count(x - y) == SUB + assert count(y - x) == SUB + assert count(-1/(x - y)) == DIV + NEG + SUB + assert count(-1/(y - x)) == DIV + NEG + SUB + assert count(1 + x**y) == ADD + POW + assert count(1 + x + y) == 2*ADD + assert count(1 + x + y + z) == 3*ADD + assert count(1 + x**y + 2*x*y + y**2) == 3*ADD + 2*POW + 2*MUL + assert count(2*z + y + x + 1) == 3*ADD + MUL + assert count(2*z + y**17 + x + 1) == 3*ADD + MUL + POW + assert count(2*z + y**17 + x + sin(x)) == 3*ADD + POW + MUL + SIN + assert count(2*z + y**17 + x + sin(x**2)) == 3*ADD + MUL + 2*POW + SIN + assert count(2*z + y**17 + x + sin( + x**2) + exp(cos(x))) == 4*ADD + MUL + 2*POW + EXP + COS + SIN + + assert count(Derivative(x, x)) == D + assert count(Integral(x, x) + 2*x/(1 + x)) == G + DIV + MUL + 2*ADD + assert count(Sum(x, (x, 1, x + 1)) + 2*x/(1 + x)) == M + DIV + MUL + 3*ADD + assert count(Basic()) is S.Zero + + assert count({x + 1: sin(x)}) == ADD + SIN + assert count([x + 1, sin(x) + y, None]) == ADD + SIN + ADD + assert count({x + 1: sin(x), y: cos(x) + 1}) == SIN + COS + 2*ADD + assert count({}) is S.Zero + assert count([x + 1, sin(x)*y, None]) == SIN + ADD + MUL + assert count([]) is S.Zero + + assert count(Basic()) == 0 + assert count(Basic(Basic(),Basic(x,x+y))) == ADD + 2*BASIC + assert count(Basic(x, x + y)) == ADD + BASIC + assert [count(Rel(x, y, op)) for op in '< <= > >= == <> !='.split() + ] == [LT, LE, GT, GE, EQ, NE, NE] + assert count(Or(x, y)) == OR + assert count(And(x, y)) == AND + assert count(Or(x, Or(y, And(z, a)))) == AND + OR + assert count(Nor(x, y)) == NOT + OR + assert count(Nand(x, y)) == NOT + AND + assert count(Xor(x, y)) == XOR + assert count(Implies(x, y)) == IMPLIES + assert count(Equivalent(x, y)) == EQUIVALENT + assert count(ITE(x, y, z)) == _ITE + assert count([Or(x, y), And(x, y), Basic(x + y)] + ) == ADD + AND + BASIC + OR + + assert count(Basic(Tuple(x))) == BASIC + TUPLE + #It checks that TUPLE is counted as an operation. + + assert count(Eq(x + y, S(2))) == ADD + EQ + + +def test_issue_9324(): + def count(val): + return count_ops(val, visual=False) + + M = MatrixSymbol('M', 10, 10) + assert count(M[0, 0]) == 0 + assert count(2 * M[0, 0] + M[5, 7]) == 2 + P = MatrixSymbol('P', 3, 3) + Q = MatrixSymbol('Q', 3, 3) + assert count(P + Q) == 1 + m = Symbol('m', integer=True) + n = Symbol('n', integer=True) + M = MatrixSymbol('M', m + n, m * m) + assert count(M[0, 1]) == 2 + + +def test_issue_21532(): + f = Function('f') + g = Function('g') + FUNC_F, FUNC_G = symbols('FUNC_F, FUNC_G') + assert f(x).count_ops(visual=True) == FUNC_F + assert g(x).count_ops(visual=True) == FUNC_G diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_diff.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_diff.py new file mode 100644 index 0000000000000000000000000000000000000000..effc9cd91d2e7b6f8f8e5fd04bb667ed71c0ffaf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_diff.py @@ -0,0 +1,160 @@ +from sympy.concrete.summations import Sum +from sympy.core.expr import Expr +from sympy.core.function import (Derivative, Function, diff, Subs) +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, cot, sin, tan) +from sympy.tensor.array.ndim_array import NDimArray +from sympy.testing.pytest import raises +from sympy.abc import a, b, c, x, y, z + +def test_diff(): + assert Rational(1, 3).diff(x) is S.Zero + assert I.diff(x) is S.Zero + assert pi.diff(x) is S.Zero + assert x.diff(x, 0) == x + assert (x**2).diff(x, 2, x) == 0 + assert (x**2).diff((x, 2), x) == 0 + assert (x**2).diff((x, 1), x) == 2 + assert (x**2).diff((x, 1), (x, 1)) == 2 + assert (x**2).diff((x, 2)) == 2 + assert (x**2).diff(x, y, 0) == 2*x + assert (x**2).diff(x, (y, 0)) == 2*x + assert (x**2).diff(x, y) == 0 + raises(ValueError, lambda: x.diff(1, x)) + + p = Rational(5) + e = a*b + b**p + assert e.diff(a) == b + assert e.diff(b) == a + 5*b**4 + assert e.diff(b).diff(a) == Rational(1) + e = a*(b + c) + assert e.diff(a) == b + c + assert e.diff(b) == a + assert e.diff(b).diff(a) == Rational(1) + e = c**p + assert e.diff(c, 6) == Rational(0) + assert e.diff(c, 5) == Rational(120) + e = c**Rational(2) + assert e.diff(c) == 2*c + e = a*b*c + assert e.diff(c) == a*b + + +def test_diff2(): + n3 = Rational(3) + n2 = Rational(2) + n6 = Rational(6) + + e = n3*(-n2 + x**n2)*cos(x) + x*(-n6 + x**n2)*sin(x) + assert e == 3*(-2 + x**2)*cos(x) + x*(-6 + x**2)*sin(x) + assert e.diff(x).expand() == x**3*cos(x) + + e = (x + 1)**3 + assert e.diff(x) == 3*(x + 1)**2 + e = x*(x + 1)**3 + assert e.diff(x) == (x + 1)**3 + 3*x*(x + 1)**2 + e = 2*exp(x*x)*x + assert e.diff(x) == 2*exp(x**2) + 4*x**2*exp(x**2) + + +def test_diff3(): + p = Rational(5) + e = a*b + sin(b**p) + assert e == a*b + sin(b**5) + assert e.diff(a) == b + assert e.diff(b) == a + 5*b**4*cos(b**5) + e = tan(c) + assert e == tan(c) + assert e.diff(c) in [cos(c)**(-2), 1 + sin(c)**2/cos(c)**2, 1 + tan(c)**2] + e = c*log(c) - c + assert e == -c + c*log(c) + assert e.diff(c) == log(c) + e = log(sin(c)) + assert e == log(sin(c)) + assert e.diff(c) in [sin(c)**(-1)*cos(c), cot(c)] + e = (Rational(2)**a/log(Rational(2))) + assert e == 2**a*log(Rational(2))**(-1) + assert e.diff(a) == 2**a + + +def test_diff_no_eval_derivative(): + class My(Expr): + def __new__(cls, x): + return Expr.__new__(cls, x) + + # My doesn't have its own _eval_derivative method + assert My(x).diff(x).func is Derivative + assert My(x).diff(x, 3).func is Derivative + assert re(x).diff(x, 2) == Derivative(re(x), (x, 2)) # issue 15518 + assert diff(NDimArray([re(x), im(x)]), (x, 2)) == NDimArray( + [Derivative(re(x), (x, 2)), Derivative(im(x), (x, 2))]) + # it doesn't have y so it shouldn't need a method for this case + assert My(x).diff(y) == 0 + + +def test_speed(): + # this should return in 0.0s. If it takes forever, it's wrong. + assert x.diff(x, 10**8) == 0 + + +def test_deriv_noncommutative(): + A = Symbol("A", commutative=False) + f = Function("f") + assert A*f(x)*A == f(x)*A**2 + assert A*f(x).diff(x)*A == f(x).diff(x) * A**2 + + +def test_diff_nth_derivative(): + f = Function("f") + n = Symbol("n", integer=True) + + expr = diff(sin(x), (x, n)) + expr2 = diff(f(x), (x, 2)) + expr3 = diff(f(x), (x, n)) + + assert expr.subs(sin(x), cos(-x)) == Derivative(cos(-x), (x, n)) + assert expr.subs(n, 1).doit() == cos(x) + assert expr.subs(n, 2).doit() == -sin(x) + + assert expr2.subs(Derivative(f(x), x), y) == Derivative(y, x) + # Currently not supported (cannot determine if `n > 1`): + #assert expr3.subs(Derivative(f(x), x), y) == Derivative(y, (x, n-1)) + assert expr3 == Derivative(f(x), (x, n)) + + assert diff(x, (x, n)) == Piecewise((x, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) + assert diff(2*x, (x, n)).dummy_eq( + Sum(Piecewise((2*x*factorial(n)/(factorial(y)*factorial(-y + n)), + Eq(y, 0) & Eq(Max(0, -y + n), 0)), + (2*factorial(n)/(factorial(y)*factorial(-y + n)), Eq(y, 0) & Eq(Max(0, + -y + n), 1)), (0, True)), (y, 0, n))) + # TODO: assert diff(x**2, (x, n)) == x**(2-n)*ff(2, n) + exprm = x*sin(x) + mul_diff = diff(exprm, (x, n)) + assert isinstance(mul_diff, Sum) + for i in range(5): + assert mul_diff.subs(n, i).doit() == exprm.diff((x, i)).expand() + + exprm2 = 2*y*x*sin(x)*cos(x)*log(x)*exp(x) + dex = exprm2.diff((x, n)) + assert isinstance(dex, Sum) + for i in range(7): + assert dex.subs(n, i).doit().expand() == \ + exprm2.diff((x, i)).expand() + + assert (cos(x)*sin(y)).diff([[x, y, z]]) == NDimArray([ + -sin(x)*sin(y), cos(x)*cos(y), 0]) + + +def test_issue_16160(): + assert Derivative(x**3, (x, x)).subs(x, 2) == Subs( + Derivative(x**3, (x, 2)), x, 2) + assert Derivative(1 + x**3, (x, x)).subs(x, 0 + ) == Derivative(1 + y**3, (y, 0)).subs(y, 0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_equal.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_equal.py new file mode 100644 index 0000000000000000000000000000000000000000..82213b757cda5fbd80310e387bdf00cc1c9c25fe --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_equal.py @@ -0,0 +1,89 @@ +from sympy.core.numbers import Rational +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.exponential import exp + + +def test_equal(): + b = Symbol("b") + a = Symbol("a") + e1 = a + b + e2 = 2*a*b + e3 = a**3*b**2 + e4 = a*b + b*a + assert not e1 == e2 + assert not e1 == e2 + assert e1 != e2 + assert e2 == e4 + assert e2 != e3 + assert not e2 == e3 + + x = Symbol("x") + e1 = exp(x + 1/x) + y = Symbol("x") + e2 = exp(y + 1/y) + assert e1 == e2 + assert not e1 != e2 + y = Symbol("y") + e2 = exp(y + 1/y) + assert not e1 == e2 + assert e1 != e2 + + e5 = Rational(3) + 2*x - x - x + assert e5 == 3 + assert 3 == e5 + assert e5 != 4 + assert 4 != e5 + assert e5 != 3 + x + assert 3 + x != e5 + + +def test_expevalbug(): + x = Symbol("x") + e1 = exp(1*x) + e3 = exp(x) + assert e1 == e3 + + +def test_cmp_bug1(): + class T: + pass + + t = T() + x = Symbol("x") + + assert not (x == t) + assert (x != t) + + +def test_cmp_bug2(): + class T: + pass + + t = T() + + assert not (Symbol == t) + assert (Symbol != t) + + +def test_cmp_issue_4357(): + """ Check that Basic subclasses can be compared with sympifiable objects. + + https://github.com/sympy/sympy/issues/4357 + """ + assert not (Symbol == 1) + assert (Symbol != 1) + assert not (Symbol == 'x') + assert (Symbol != 'x') + + +def test_dummy_eq(): + x = Symbol('x') + y = Symbol('y') + + u = Dummy('u') + + assert (u**2 + 1).dummy_eq(x**2 + 1) is True + assert ((u**2 + 1) == (x**2 + 1)) is False + + assert (u**2 + y).dummy_eq(x**2 + y, x) is True + assert (u**2 + y).dummy_eq(x**2 + y, y) is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_eval.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_eval.py new file mode 100644 index 0000000000000000000000000000000000000000..9c1633f77b50483afee21c6d9fca232b1279d2b9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_eval.py @@ -0,0 +1,95 @@ +from sympy.core.function import Function +from sympy.core.numbers import (I, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, tan) +from sympy.testing.pytest import XFAIL + + +def test_add_eval(): + a = Symbol("a") + b = Symbol("b") + c = Rational(1) + p = Rational(5) + assert a*b + c + p == a*b + 6 + assert c + a + p == a + 6 + assert c + a - p == a + (-4) + assert a + a == 2*a + assert a + p + a == 2*a + 5 + assert c + p == Rational(6) + assert b + a - b == a + + +def test_addmul_eval(): + a = Symbol("a") + b = Symbol("b") + c = Rational(1) + p = Rational(5) + assert c + a + b*c + a - p == 2*a + b + (-4) + assert a*2 + p + a == a*2 + 5 + a + assert a*2 + p + a == 3*a + 5 + assert a*2 + a == 3*a + + +def test_pow_eval(): + # XXX Pow does not fully support conversion of negative numbers + # to their complex equivalent + + assert sqrt(-1) == I + + assert sqrt(-4) == 2*I + assert sqrt( 4) == 2 + assert (8)**Rational(1, 3) == 2 + assert (-8)**Rational(1, 3) == 2*((-1)**Rational(1, 3)) + + assert sqrt(-2) == I*sqrt(2) + assert (-1)**Rational(1, 3) != I + assert (-10)**Rational(1, 3) != I*((10)**Rational(1, 3)) + assert (-2)**Rational(1, 4) != (2)**Rational(1, 4) + + assert 64**Rational(1, 3) == 4 + assert 64**Rational(2, 3) == 16 + assert 24/sqrt(64) == 3 + assert (-27)**Rational(1, 3) == 3*(-1)**Rational(1, 3) + + assert (cos(2) / tan(2))**2 == (cos(2) / tan(2))**2 + + +@XFAIL +def test_pow_eval_X1(): + assert (-1)**Rational(1, 3) == S.Half + S.Half*I*sqrt(3) + + +def test_mulpow_eval(): + x = Symbol('x') + assert sqrt(50)/(sqrt(2)*x) == 5/x + assert sqrt(27)/sqrt(3) == 3 + + +def test_evalpow_bug(): + x = Symbol("x") + assert 1/(1/x) == x + assert 1/(-1/x) == -x + + +def test_symbol_expand(): + x = Symbol('x') + y = Symbol('y') + + f = x**4*y**4 + assert f == x**4*y**4 + assert f == f.expand() + + g = (x*y)**4 + assert g == f + assert g.expand() == f + assert g.expand() == g.expand().expand() + + +def test_function(): + f, l = map(Function, 'fl') + x = Symbol('x') + assert exp(l(x))*l(x)/exp(l(x)) == l(x) + assert exp(f(x))*f(x)/exp(f(x)) == f(x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py new file mode 100644 index 0000000000000000000000000000000000000000..2c3c26a2d265da9ea2daa73a9eea3091b2af1999 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py @@ -0,0 +1,738 @@ +import math + +from sympy.concrete.products import (Product, product) +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.evalf import N +from sympy.core.function import (Function, nfloat) +from sympy.core.mul import Mul +from sympy.core import (GoldenRatio) +from sympy.core.numbers import (AlgebraicNumber, E, Float, I, Rational, + oo, zoo, nan, pi) +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.functions.elementary.complexes import (Abs, re, im) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (acosh, cosh) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import (Max, sqrt) +from sympy.functions.elementary.trigonometric import (acos, atan, cos, sin, tan) +from sympy.integrals.integrals import (Integral, integrate) +from sympy.polys.polytools import factor +from sympy.polys.rootoftools import CRootOf +from sympy.polys.specialpolys import cyclotomic_poly +from sympy.printing import srepr +from sympy.printing.str import sstr +from sympy.simplify.simplify import simplify +from sympy.core.numbers import comp +from sympy.core.evalf import (complex_accuracy, PrecisionExhausted, + scaled_zero, get_integer_part, as_mpmath, evalf, _evalf_with_bounded_error) +from mpmath import inf, ninf, make_mpc +from mpmath.libmp.libmpf import from_float, fzero +from sympy.core.expr import unchanged +from sympy.testing.pytest import raises, XFAIL +from sympy.abc import n, x, y + + +def NS(e, n=15, **options): + return sstr(sympify(e).evalf(n, **options), full_prec=True) + + +def test_evalf_helpers(): + from mpmath.libmp import finf + assert complex_accuracy((from_float(2.0), None, 35, None)) == 35 + assert complex_accuracy((from_float(2.0), from_float(10.0), 35, 100)) == 37 + assert complex_accuracy( + (from_float(2.0), from_float(1000.0), 35, 100)) == 43 + assert complex_accuracy((from_float(2.0), from_float(10.0), 100, 35)) == 35 + assert complex_accuracy( + (from_float(2.0), from_float(1000.0), 100, 35)) == 35 + assert complex_accuracy(finf) == math.inf + assert complex_accuracy(zoo) == math.inf + raises(ValueError, lambda: get_integer_part(zoo, 1, {})) + + +def test_evalf_basic(): + assert NS('pi', 15) == '3.14159265358979' + assert NS('2/3', 10) == '0.6666666667' + assert NS('355/113-pi', 6) == '2.66764e-7' + assert NS('16*atan(1/5)-4*atan(1/239)', 15) == '3.14159265358979' + + +def test_cancellation(): + assert NS(Add(pi, Rational(1, 10**1000), -pi, evaluate=False), 15, + maxn=1200) == '1.00000000000000e-1000' + + +def test_evalf_powers(): + assert NS('pi**(10**20)', 10) == '1.339148777e+49714987269413385435' + assert NS(pi**(10**100), 10) == ('4.946362032e+4971498726941338543512682882' + '9089887365167832438044244613405349992494711208' + '95526746555473864642912223') + assert NS('2**(1/10**50)', 15) == '1.00000000000000' + assert NS('2**(1/10**50)-1', 15) == '6.93147180559945e-51' + +# Evaluation of Rump's ill-conditioned polynomial + + +def test_evalf_rump(): + a = 1335*y**6/4 + x**2*(11*x**2*y**2 - y**6 - 121*y**4 - 2) + 11*y**8/2 + x/(2*y) + assert NS(a, 15, subs={x: 77617, y: 33096}) == '-0.827396059946821' + + +def test_evalf_complex(): + assert NS('2*sqrt(pi)*I', 10) == '3.544907702*I' + assert NS('3+3*I', 15) == '3.00000000000000 + 3.00000000000000*I' + assert NS('E+pi*I', 15) == '2.71828182845905 + 3.14159265358979*I' + assert NS('pi * (3+4*I)', 15) == '9.42477796076938 + 12.5663706143592*I' + assert NS('I*(2+I)', 15) == '-1.00000000000000 + 2.00000000000000*I' + + +@XFAIL +def test_evalf_complex_bug(): + assert NS('(pi+E*I)*(E+pi*I)', 15) in ('0.e-15 + 17.25866050002*I', + '0.e-17 + 17.25866050002*I', '-0.e-17 + 17.25866050002*I') + + +def test_evalf_complex_powers(): + assert NS('(E+pi*I)**100000000000000000') == \ + '-3.58896782867793e+61850354284995199 + 4.58581754997159e+61850354284995199*I' + # XXX: rewrite if a+a*I simplification introduced in SymPy + #assert NS('(pi + pi*I)**2') in ('0.e-15 + 19.7392088021787*I', '0.e-16 + 19.7392088021787*I') + assert NS('(pi + pi*I)**2', chop=True) == '19.7392088021787*I' + assert NS( + '(pi + 1/10**8 + pi*I)**2') == '6.2831853e-8 + 19.7392088650106*I' + assert NS('(pi + 1/10**12 + pi*I)**2') == '6.283e-12 + 19.7392088021850*I' + assert NS('(pi + pi*I)**4', chop=True) == '-389.636364136010' + assert NS( + '(pi + 1/10**8 + pi*I)**4') == '-389.636366616512 + 2.4805021e-6*I' + assert NS('(pi + 1/10**12 + pi*I)**4') == '-389.636364136258 + 2.481e-10*I' + assert NS( + '(10000*pi + 10000*pi*I)**4', chop=True) == '-3.89636364136010e+18' + + +@XFAIL +def test_evalf_complex_powers_bug(): + assert NS('(pi + pi*I)**4') == '-389.63636413601 + 0.e-14*I' + + +def test_evalf_exponentiation(): + assert NS(sqrt(-pi)) == '1.77245385090552*I' + assert NS(Pow(pi*I, Rational( + 1, 2), evaluate=False)) == '1.25331413731550 + 1.25331413731550*I' + assert NS(pi**I) == '0.413292116101594 + 0.910598499212615*I' + assert NS(pi**(E + I/3)) == '20.8438653991931 + 8.36343473930031*I' + assert NS((pi + I/3)**(E + I/3)) == '17.2442906093590 + 13.6839376767037*I' + assert NS(exp(pi)) == '23.1406926327793' + assert NS(exp(pi + E*I)) == '-21.0981542849657 + 9.50576358282422*I' + assert NS(pi**pi) == '36.4621596072079' + assert NS((-pi)**pi) == '-32.9138577418939 - 15.6897116534332*I' + assert NS((-pi)**(-pi)) == '-0.0247567717232697 + 0.0118013091280262*I' + +# An example from Smith, "Multiple Precision Complex Arithmetic and Functions" + + +def test_evalf_complex_cancellation(): + A = Rational('63287/100000') + B = Rational('52498/100000') + C = Rational('69301/100000') + D = Rational('83542/100000') + F = Rational('2231321613/2500000000') + # XXX: the number of returned mantissa digits in the real part could + # change with the implementation. What matters is that the returned digits are + # correct; those that are showing now are correct. + # >>> ((A+B*I)*(C+D*I)).expand() + # 64471/10000000000 + 2231321613*I/2500000000 + # >>> 2231321613*4 + # 8925286452L + assert NS((A + B*I)*(C + D*I), 6) == '6.44710e-6 + 0.892529*I' + assert NS((A + B*I)*(C + D*I), 10) == '6.447100000e-6 + 0.8925286452*I' + assert NS((A + B*I)*( + C + D*I) - F*I, 5) in ('6.4471e-6 + 0.e-14*I', '6.4471e-6 - 0.e-14*I') + + +def test_evalf_logs(): + assert NS("log(3+pi*I)", 15) == '1.46877619736226 + 0.808448792630022*I' + assert NS("log(pi*I)", 15) == '1.14472988584940 + 1.57079632679490*I' + assert NS('log(-1 + 0.00001)', 2) == '-1.0e-5 + 3.1*I' + assert NS('log(100, 10, evaluate=False)', 15) == '2.00000000000000' + assert NS('-2*I*log(-(-1)**(S(1)/9))', 15) == '-5.58505360638185' + + +def test_evalf_trig(): + assert NS('sin(1)', 15) == '0.841470984807897' + assert NS('cos(1)', 15) == '0.540302305868140' + assert NS('tan(1)', 15) == '1.55740772465490' + assert NS('sin(10**-6)', 15) == '9.99999999999833e-7' + assert NS('cos(10**-6)', 15) == '0.999999999999500' + assert NS('tan(10**-6)', 15) == '1.00000000000033e-6' + assert NS('sin(E*10**100)', 15) == '0.409160531722613' + assert NS('tan(I)',15) =='0.761594155955765*I' + assert NS('tan(1000*I)',15)== '1.00000000000000*I' + # Some input near roots + assert NS(sin(exp(pi*sqrt(163))*pi), 15) == '-2.35596641936785e-12' + assert NS(sin(pi*10**100 + Rational(7, 10**5), evaluate=False), 15, maxn=120) == \ + '6.99999999428333e-5' + assert NS(sin(Rational(7, 10**5), evaluate=False), 15) == \ + '6.99999999428333e-5' + +# Check detection of various false identities + + +def test_evalf_near_integers(): + # Binet's formula + f = lambda n: ((1 + sqrt(5))**n)/(2**n * sqrt(5)) + assert NS(f(5000) - fibonacci(5000), 10, maxn=1500) == '5.156009964e-1046' + # Some near-integer identities from + # http://mathworld.wolfram.com/AlmostInteger.html + assert NS('sin(2017*2**(1/5))', 15) == '-1.00000000000000' + assert NS('sin(2017*2**(1/5))', 20) == '-0.99999999999999997857' + assert NS('1+sin(2017*2**(1/5))', 15) == '2.14322287389390e-17' + assert NS('45 - 613*E/37 + 35/991', 15) == '6.03764498766326e-11' + + +def test_evalf_ramanujan(): + assert NS(exp(pi*sqrt(163)) - 640320**3 - 744, 10) == '-7.499274028e-13' + # A related identity + A = 262537412640768744*exp(-pi*sqrt(163)) + B = 196884*exp(-2*pi*sqrt(163)) + C = 103378831900730205293632*exp(-3*pi*sqrt(163)) + assert NS(1 - A - B + C, 10) == '1.613679005e-59' + +# Input that for various reasons have failed at some point + + +def test_evalf_bugs(): + assert NS(sin(1) + exp(-10**10), 10) == NS(sin(1), 10) + assert NS(exp(10**10) + sin(1), 10) == NS(exp(10**10), 10) + assert NS('expand_log(log(1+1/10**50))', 20) == '1.0000000000000000000e-50' + assert NS('log(10**100,10)', 10) == '100.0000000' + assert NS('log(2)', 10) == '0.6931471806' + assert NS( + '(sin(x)-x)/x**3', 15, subs={x: '1/10**50'}) == '-0.166666666666667' + assert NS(sin(1) + Rational( + 1, 10**100)*I, 15) == '0.841470984807897 + 1.00000000000000e-100*I' + assert x.evalf() == x + assert NS((1 + I)**2*I, 6) == '-2.00000' + d = {n: ( + -1)**Rational(6, 7), y: (-1)**Rational(4, 7), x: (-1)**Rational(2, 7)} + assert NS((x*(1 + y*(1 + n))).subs(d).evalf(), 6) == '0.346011 + 0.433884*I' + assert NS(((-I - sqrt(2)*I)**2).evalf()) == '-5.82842712474619' + assert NS((1 + I)**2*I, 15) == '-2.00000000000000' + # issue 4758 (1/2): + assert NS(pi.evalf(69) - pi) == '-4.43863937855894e-71' + # issue 4758 (2/2): With the bug present, this still only fails if the + # terms are in the order given here. This is not generally the case, + # because the order depends on the hashes of the terms. + assert NS(20 - 5008329267844*n**25 - 477638700*n**37 - 19*n, + subs={n: .01}) == '19.8100000000000' + assert NS(((x - 1)*(1 - x)**1000).n() + ) == '(1.00000000000000 - x)**1000*(x - 1.00000000000000)' + assert NS((-x).n()) == '-x' + assert NS((-2*x).n()) == '-2.00000000000000*x' + assert NS((-2*x*y).n()) == '-2.00000000000000*x*y' + assert cos(x).n(subs={x: 1+I}) == cos(x).subs(x, 1+I).n() + # issue 6660. Also NaN != mpmath.nan + # In this order: + # 0*nan, 0/nan, 0*inf, 0/inf + # 0+nan, 0-nan, 0+inf, 0-inf + # >>> n = Some Number + # n*nan, n/nan, n*inf, n/inf + # n+nan, n-nan, n+inf, n-inf + assert (0*E**(oo)).n() is S.NaN + assert (0/E**(oo)).n() is S.Zero + + assert (0+E**(oo)).n() is S.Infinity + assert (0-E**(oo)).n() is S.NegativeInfinity + + assert (5*E**(oo)).n() is S.Infinity + assert (5/E**(oo)).n() is S.Zero + + assert (5+E**(oo)).n() is S.Infinity + assert (5-E**(oo)).n() is S.NegativeInfinity + + #issue 7416 + assert as_mpmath(0.0, 10, {'chop': True}) == 0 + + #issue 5412 + assert ((oo*I).n() == S.Infinity*I) + assert ((oo+oo*I).n() == S.Infinity + S.Infinity*I) + + #issue 11518 + assert NS(2*x**2.5, 5) == '2.0000*x**2.5000' + + #issue 13076 + assert NS(Mul(Max(0, y), x, evaluate=False).evalf()) == 'x*Max(0, y)' + + #issue 18516 + assert NS(log(S(3273390607896141870013189696827599152216642046043064789483291368096133796404674554883270092325904157150886684127560071009217256545885393053328527589376)/36360291795869936842385267079543319118023385026001623040346035832580600191583895484198508262979388783308179702534403855752855931517013066142992430916562025780021771247847643450125342836565813209972590371590152578728008385990139795377610001).evalf(15, chop=True)) == '-oo' + + +def test_evalf_integer_parts(): + a = floor(log(8)/log(2) - exp(-1000), evaluate=False) + b = floor(log(8)/log(2), evaluate=False) + assert a.evalf() == 3.0 + assert b.evalf() == 3.0 + # equals, as a fallback, can still fail but it might succeed as here + assert ceiling(10*(sin(1)**2 + cos(1)**2)) == 10 + + assert int(floor(factorial(50)/E, evaluate=False).evalf(70)) == \ + int(11188719610782480504630258070757734324011354208865721592720336800) + assert int(ceiling(factorial(50)/E, evaluate=False).evalf(70)) == \ + int(11188719610782480504630258070757734324011354208865721592720336801) + assert int(floor(GoldenRatio**999 / sqrt(5) + S.Half) + .evalf(1000)) == fibonacci(999) + assert int(floor(GoldenRatio**1000 / sqrt(5) + S.Half) + .evalf(1000)) == fibonacci(1000) + + assert ceiling(x).evalf(subs={x: 3}) == 3.0 + assert ceiling(x).evalf(subs={x: 3*I}) == 3.0*I + assert ceiling(x).evalf(subs={x: 2 + 3*I}) == 2.0 + 3.0*I + assert ceiling(x).evalf(subs={x: 3.}) == 3.0 + assert ceiling(x).evalf(subs={x: 3.*I}) == 3.0*I + assert ceiling(x).evalf(subs={x: 2. + 3*I}) == 2.0 + 3.0*I + + assert float((floor(1.5, evaluate=False)+1/9).evalf()) == 1 + 1/9 + assert float((floor(0.5, evaluate=False)+20).evalf()) == 20 + + # issue 19991 + n = 1169809367327212570704813632106852886389036911 + r = 744723773141314414542111064094745678855643068 + + assert floor(n / (pi / 2)) == r + assert floor(80782 * sqrt(2)) == 114242 + + # issue 20076 + assert 260515 - floor(260515/pi + 1/2) * pi == atan(tan(260515)) + + assert floor(x).evalf(subs={x: sqrt(2)}) == 1.0 + + +def test_evalf_trig_zero_detection(): + a = sin(160*pi, evaluate=False) + t = a.evalf(maxn=100) + assert abs(t) < 1e-100 + assert t._prec < 2 + assert a.evalf(chop=True) == 0 + raises(PrecisionExhausted, lambda: a.evalf(strict=True)) + + +def test_evalf_sum(): + assert Sum(n,(n,1,2)).evalf() == 3. + assert Sum(n,(n,1,2)).doit().evalf() == 3. + # the next test should return instantly + assert Sum(1/n,(n,1,2)).evalf() == 1.5 + + # issue 8219 + assert Sum(E/factorial(n), (n, 0, oo)).evalf() == (E*E).evalf() + # issue 8254 + assert Sum(2**n*n/factorial(n), (n, 0, oo)).evalf() == (2*E*E).evalf() + # issue 8411 + s = Sum(1/x**2, (x, 100, oo)) + assert s.n() == s.doit().n() + + +def test_evalf_divergent_series(): + raises(ValueError, lambda: Sum(1/n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(n/(n**2 + 1), (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-1)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-1)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(n**2, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(2**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-2)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((2*n + 3)/(3*n**2 + 4), (n, 0, oo)).evalf()) + raises(ValueError, lambda: Sum((0.5*n**3)/(n**4 + 1), (n, 0, oo)).evalf()) + + +def test_evalf_product(): + assert Product(n, (n, 1, 10)).evalf() == 3628800. + assert comp(Product(1 - S.Half**2/n**2, (n, 1, oo)).n(5), 0.63662) + assert Product(n, (n, -1, 3)).evalf() == 0 + + +def test_evalf_py_methods(): + assert abs(float(pi + 1) - 4.1415926535897932) < 1e-10 + assert abs(complex(pi + 1) - 4.1415926535897932) < 1e-10 + assert abs( + complex(pi + E*I) - (3.1415926535897931 + 2.7182818284590451j)) < 1e-10 + raises(TypeError, lambda: float(pi + x)) + + +def test_evalf_power_subs_bugs(): + assert (x**2).evalf(subs={x: 0}) == 0 + assert sqrt(x).evalf(subs={x: 0}) == 0 + assert (x**Rational(2, 3)).evalf(subs={x: 0}) == 0 + assert (x**x).evalf(subs={x: 0}) == 1.0 + assert (3**x).evalf(subs={x: 0}) == 1.0 + assert exp(x).evalf(subs={x: 0}) == 1.0 + assert ((2 + I)**x).evalf(subs={x: 0}) == 1.0 + assert (0**x).evalf(subs={x: 0}) == 1.0 + + +def test_evalf_arguments(): + raises(TypeError, lambda: pi.evalf(method="garbage")) + + +def test_implemented_function_evalf(): + from sympy.utilities.lambdify import implemented_function + f = Function('f') + f = implemented_function(f, lambda x: x + 1) + assert str(f(x)) == "f(x)" + assert str(f(2)) == "f(2)" + assert f(2).evalf() == 3.0 + assert f(x).evalf() == f(x) + f = implemented_function(Function('sin'), lambda x: x + 1) + assert f(2).evalf() != sin(2) + del f._imp_ # XXX: due to caching _imp_ would influence all other tests + + +def test_evaluate_false(): + for no in [0, False]: + assert Add(3, 2, evaluate=no).is_Add + assert Mul(3, 2, evaluate=no).is_Mul + assert Pow(3, 2, evaluate=no).is_Pow + assert Pow(y, 2, evaluate=True) - Pow(y, 2, evaluate=True) == 0 + + +def test_evalf_relational(): + assert Eq(x/5, y/10).evalf() == Eq(0.2*x, 0.1*y) + # if this first assertion fails it should be replaced with + # one that doesn't + assert unchanged(Eq, (3 - I)**2/2 + I, 0) + assert Eq((3 - I)**2/2 + I, 0).n() is S.false + assert nfloat(Eq((3 - I)**2 + I, 0)) == S.false + + +def test_issue_5486(): + assert not cos(sqrt(0.5 + I)).n().is_Function + + +def test_issue_5486_bug(): + from sympy.core.expr import Expr + from sympy.core.numbers import I + assert abs(Expr._from_mpmath(I._to_mpmath(15), 15) - I) < 1.0e-15 + + +def test_bugs(): + from sympy.functions.elementary.complexes import (polar_lift, re) + + assert abs(re((1 + I)**2)) < 1e-15 + + # anything that evalf's to 0 will do in place of polar_lift + assert abs(polar_lift(0)).n() == 0 + + +def test_subs(): + assert NS('besseli(-x, y) - besseli(x, y)', subs={x: 3.5, y: 20.0}) == \ + '-4.92535585957223e-10' + assert NS('Piecewise((x, x>0)) + Piecewise((1-x, x>0))', subs={x: 0.1}) == \ + '1.00000000000000' + raises(TypeError, lambda: x.evalf(subs=(x, 1))) + + +def test_issue_4956_5204(): + # issue 4956 + v = S('''(-27*12**(1/3)*sqrt(31)*I + + 27*2**(2/3)*3**(1/3)*sqrt(31)*I)/(-2511*2**(2/3)*3**(1/3) + + (29*18**(1/3) + 9*2**(1/3)*3**(2/3)*sqrt(31)*I + + 87*2**(1/3)*3**(1/6)*I)**2)''') + assert NS(v, 1) == '0.e-118 - 0.e-118*I' + + # issue 5204 + v = S('''-(357587765856 + 18873261792*249**(1/2) + 56619785376*I*83**(1/2) + + 108755765856*I*3**(1/2) + 41281887168*6**(1/3)*(1422 + + 54*249**(1/2))**(1/3) - 1239810624*6**(1/3)*249**(1/2)*(1422 + + 54*249**(1/2))**(1/3) - 3110400000*I*6**(1/3)*83**(1/2)*(1422 + + 54*249**(1/2))**(1/3) + 13478400000*I*3**(1/2)*6**(1/3)*(1422 + + 54*249**(1/2))**(1/3) + 1274950152*6**(2/3)*(1422 + + 54*249**(1/2))**(2/3) + 32347944*6**(2/3)*249**(1/2)*(1422 + + 54*249**(1/2))**(2/3) - 1758790152*I*3**(1/2)*6**(2/3)*(1422 + + 54*249**(1/2))**(2/3) - 304403832*I*6**(2/3)*83**(1/2)*(1422 + + 4*249**(1/2))**(2/3))/(175732658352 + (1106028 + 25596*249**(1/2) + + 76788*I*83**(1/2))**2)''') + assert NS(v, 5) == '0.077284 + 1.1104*I' + assert NS(v, 1) == '0.08 + 1.*I' + + +def test_old_docstring(): + a = (E + pi*I)*(E - pi*I) + assert NS(a) == '17.2586605000200' + assert a.n() == 17.25866050002001 + + +def test_issue_4806(): + assert integrate(atan(x)**2, (x, -1, 1)).evalf().round(1) == Float(0.5, 1) + assert atan(0, evaluate=False).n() == 0 + + +def test_evalf_mul(): + # SymPy should not try to expand this; it should be handled term-wise + # in evalf through mpmath + assert NS(product(1 + sqrt(n)*I, (n, 1, 500)), 1) == '5.e+567 + 2.e+568*I' + + +def test_scaled_zero(): + a, b = (([0], 1, 100, 1), -1) + assert scaled_zero(100) == (a, b) + assert scaled_zero(a) == (0, 1, 100, 1) + a, b = (([1], 1, 100, 1), -1) + assert scaled_zero(100, -1) == (a, b) + assert scaled_zero(a) == (1, 1, 100, 1) + raises(ValueError, lambda: scaled_zero(scaled_zero(100))) + raises(ValueError, lambda: scaled_zero(100, 2)) + raises(ValueError, lambda: scaled_zero(100, 0)) + raises(ValueError, lambda: scaled_zero((1, 5, 1, 3))) + + +def test_chop_value(): + for i in range(-27, 28): + assert (Pow(10, i)*2).n(chop=10**i) and not (Pow(10, i)).n(chop=10**i) + + +def test_infinities(): + assert oo.evalf(chop=True) == inf + assert (-oo).evalf(chop=True) == ninf + + +def test_to_mpmath(): + assert sqrt(3)._to_mpmath(20)._mpf_ == (0, int(908093), -19, 20) + assert S(3.2)._to_mpmath(20)._mpf_ == (0, int(838861), -18, 20) + + +def test_issue_6632_evalf(): + add = (-100000*sqrt(2500000001) + 5000000001) + assert add.n() == 9.999999998e-11 + assert (add*add).n() == 9.999999996e-21 + + +def test_issue_4945(): + from sympy.abc import H + assert (H/0).evalf(subs={H:1}) == zoo + + +def test_evalf_integral(): + # test that workprec has to increase in order to get a result other than 0 + eps = Rational(1, 1000000) + assert Integral(sin(x), (x, -pi, pi + eps)).n(2)._prec == 10 + + +def test_issue_8821_highprec_from_str(): + s = str(pi.evalf(128)) + p = N(s) + assert Abs(sin(p)) < 1e-15 + p = N(s, 64) + assert Abs(sin(p)) < 1e-64 + + +def test_issue_8853(): + p = Symbol('x', even=True, positive=True) + assert floor(-p - S.Half).is_even == False + assert floor(-p + S.Half).is_even == True + assert ceiling(p - S.Half).is_even == True + assert ceiling(p + S.Half).is_even == False + + assert get_integer_part(S.Half, -1, {}, True) == (0, 0) + assert get_integer_part(S.Half, 1, {}, True) == (1, 0) + assert get_integer_part(Rational(-1, 2), -1, {}, True) == (-1, 0) + assert get_integer_part(Rational(-1, 2), 1, {}, True) == (0, 0) + + +def test_issue_17681(): + class identity_func(Function): + + def _eval_evalf(self, *args, **kwargs): + return self.args[0].evalf(*args, **kwargs) + + assert floor(identity_func(S(0))) == 0 + assert get_integer_part(S(0), 1, {}, True) == (0, 0) + + +def test_issue_9326(): + from sympy.core.symbol import Dummy + d1 = Dummy('d') + d2 = Dummy('d') + e = d1 + d2 + assert e.evalf(subs = {d1: 1, d2: 2}) == 3.0 + + +def test_issue_10323(): + assert ceiling(sqrt(2**30 + 1)) == 2**15 + 1 + + +def test_AssocOp_Function(): + # the first arg of Min is not comparable in the imaginary part + raises(ValueError, lambda: S(''' + Min(-sqrt(3)*cos(pi/18)/6 + re(1/((-1/2 - sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3 + sin(pi/18)/2 + 2 + I*(-cos(pi/18)/2 - + sqrt(3)*sin(pi/18)/6 + im(1/((-1/2 - sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3), re(1/((-1/2 + sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3 - sqrt(3)*cos(pi/18)/6 - sin(pi/18)/2 + 2 + + I*(im(1/((-1/2 + sqrt(3)*I/2)*(1/6 + sqrt(3)*I/18)**(1/3)))/3 - + sqrt(3)*sin(pi/18)/6 + cos(pi/18)/2))''')) + # if that is changed so a non-comparable number remains as + # an arg, then the Min/Max instantiation needs to be changed + # to watch out for non-comparable args when making simplifications + # and the following test should be added instead (with e being + # the sympified expression above): + # raises(ValueError, lambda: e._eval_evalf(2)) + + +def test_issue_10395(): + eq = x*Max(0, y) + assert nfloat(eq) == eq + eq = x*Max(y, -1.1) + assert nfloat(eq) == eq + assert Max(y, 4).n() == Max(4.0, y) + + +def test_issue_13098(): + assert floor(log(S('9.'+'9'*20), 10)) == 0 + assert ceiling(log(S('9.'+'9'*20), 10)) == 1 + assert floor(log(20 - S('9.'+'9'*20), 10)) == 1 + assert ceiling(log(20 - S('9.'+'9'*20), 10)) == 2 + + +def test_issue_14601(): + e = 5*x*y/2 - y*(35*(x**3)/2 - 15*x/2) + subst = {x:0.0, y:0.0} + e2 = e.evalf(subs=subst) + assert float(e2) == 0.0 + assert float((x + x*(x**2 + x)).evalf(subs={x: 0.0})) == 0.0 + + +def test_issue_11151(): + z = S.Zero + e = Sum(z, (x, 1, 2)) + assert e != z # it shouldn't evaluate + # when it does evaluate, this is what it should give + assert evalf(e, 15, {}) == \ + evalf(z, 15, {}) == (None, None, 15, None) + # so this shouldn't fail + assert (e/2).n() == 0 + # this was where the issue appeared + expr0 = Sum(x**2 + x, (x, 1, 2)) + expr1 = Sum(0, (x, 1, 2)) + expr2 = expr1/expr0 + assert simplify(factor(expr2) - expr2) == 0 + + +def test_issue_13425(): + assert N('2**.5', 30) == N('sqrt(2)', 30) + assert N('x - x', 30) == 0 + assert abs((N('pi*.1', 22)*10 - pi).n()) < 1e-22 + + +def test_issue_17421(): + assert N(acos(-I + acosh(cosh(cosh(1) + I)))) == 1.0*I + + +def test_issue_20291(): + from sympy.sets import EmptySet, Reals + from sympy.sets.sets import (Complement, FiniteSet, Intersection) + a = Symbol('a') + b = Symbol('b') + A = FiniteSet(a, b) + assert A.evalf(subs={a: 1, b: 2}) == FiniteSet(1.0, 2.0) + B = FiniteSet(a-b, 1) + assert B.evalf(subs={a: 1, b: 2}) == FiniteSet(-1.0, 1.0) + + sol = Complement(Intersection(FiniteSet(-b/2 - sqrt(b**2-4*pi)/2), Reals), FiniteSet(0)) + assert sol.evalf(subs={b: 1}) == EmptySet + + +def test_evalf_with_zoo(): + assert (1/x).evalf(subs={x: 0}) == zoo # issue 8242 + assert (-1/x).evalf(subs={x: 0}) == zoo # PR 16150 + assert (0 ** x).evalf(subs={x: -1}) == zoo # PR 16150 + assert (0 ** x).evalf(subs={x: -1 + I}) == nan + assert Mul(2, Pow(0, -1, evaluate=False), evaluate=False).evalf() == zoo # issue 21147 + assert Mul(x, 1/x, evaluate=False).evalf(subs={x: 0}) == Mul(x, 1/x, evaluate=False).subs(x, 0) == nan + assert Mul(1/x, 1/x, evaluate=False).evalf(subs={x: 0}) == zoo + assert Mul(1/x, Abs(1/x), evaluate=False).evalf(subs={x: 0}) == zoo + assert Abs(zoo, evaluate=False).evalf() == oo + assert re(zoo, evaluate=False).evalf() == nan + assert im(zoo, evaluate=False).evalf() == nan + assert Add(zoo, zoo, evaluate=False).evalf() == nan + assert Add(oo, zoo, evaluate=False).evalf() == nan + assert Pow(zoo, -1, evaluate=False).evalf() == 0 + assert Pow(zoo, Rational(-1, 3), evaluate=False).evalf() == 0 + assert Pow(zoo, Rational(1, 3), evaluate=False).evalf() == zoo + assert Pow(zoo, S.Half, evaluate=False).evalf() == zoo + assert Pow(zoo, 2, evaluate=False).evalf() == zoo + assert Pow(0, zoo, evaluate=False).evalf() == nan + assert log(zoo, evaluate=False).evalf() == zoo + assert zoo.evalf(chop=True) == zoo + assert x.evalf(subs={x: zoo}) == zoo + + +def test_evalf_with_bounded_error(): + cases = [ + # zero + (Rational(0), None, 1), + # zero im part + (pi, None, 10), + # zero real part + (pi*I, None, 10), + # re and im nonzero + (2-3*I, None, 5), + # similar tests again, but using eps instead of m + (Rational(0), Rational(1, 2), None), + (pi, Rational(1, 1000), None), + (pi * I, Rational(1, 1000), None), + (2 - 3 * I, Rational(1, 1000), None), + # very large eps + (2 - 3 * I, Rational(1000), None), + # case where x already small, hence some cancellation in p = m + n - 1 + (Rational(1234, 10**8), Rational(1, 10**12), None), + ] + for x0, eps, m in cases: + a, b, _, _ = evalf(x0, 53, {}) + c, d, _, _ = _evalf_with_bounded_error(x0, eps, m) + if eps is None: + eps = 2**(-m) + z = make_mpc((a or fzero, b or fzero)) + w = make_mpc((c or fzero, d or fzero)) + assert abs(w - z) < eps + + # eps must be positive + raises(ValueError, lambda: _evalf_with_bounded_error(pi, Rational(0))) + raises(ValueError, lambda: _evalf_with_bounded_error(pi, -pi)) + raises(ValueError, lambda: _evalf_with_bounded_error(pi, I)) + + +def test_issue_22849(): + a = -8 + 3 * sqrt(3) + x = AlgebraicNumber(a) + assert evalf(a, 1, {}) == evalf(x, 1, {}) + + +def test_evalf_real_alg_num(): + # This test demonstrates why the entry for `AlgebraicNumber` in + # `sympy.core.evalf._create_evalf_table()` has to use `x.to_root()`, + # instead of `x.as_expr()`. If the latter is used, then `z` will be + # a complex number with `0.e-20` for imaginary part, even though `a5` + # is a real number. + zeta = Symbol('zeta') + a5 = AlgebraicNumber(CRootOf(cyclotomic_poly(5), -1), [-1, -1, 0, 0], alias=zeta) + z = a5.evalf() + assert isinstance(z, Float) + assert not hasattr(z, '_mpc_') + assert hasattr(z, '_mpf_') + + +def test_issue_20733(): + expr = 1/((x - 9)*(x - 8)*(x - 7)*(x - 4)**2*(x - 3)**3*(x - 2)) + assert str(expr.evalf(1, subs={x:1})) == '-4.e-5' + assert str(expr.evalf(2, subs={x:1})) == '-4.1e-5' + assert str(expr.evalf(11, subs={x:1})) == '-4.1335978836e-5' + assert str(expr.evalf(20, subs={x:1})) == '-0.000041335978835978835979' + + expr = Mul(*((x - i) for i in range(2, 1000))) + assert srepr(expr.evalf(2, subs={x: 1})) == "Float('4.0271e+2561', precision=10)" + assert srepr(expr.evalf(10, subs={x: 1})) == "Float('4.02790050126e+2561', precision=37)" + assert srepr(expr.evalf(53, subs={x: 1})) == "Float('4.0279005012722099453824067459760158730668154575647110393e+2561', precision=179)" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expand.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expand.py new file mode 100644 index 0000000000000000000000000000000000000000..e7abb5daacebbe81664b3de3a7ac35a490ab31bc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expand.py @@ -0,0 +1,364 @@ +from sympy.core.expr import unchanged +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational as R, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.series.order import O +from sympy.simplify.radsimp import expand_numer +from sympy.core.function import (expand, expand_multinomial, + expand_power_base, expand_log) + +from sympy.testing.pytest import raises +from sympy.core.random import verify_numerically + +from sympy.abc import x, y, z + + +def test_expand_no_log(): + assert ( + (1 + log(x**4))**2).expand(log=False) == 1 + 2*log(x**4) + log(x**4)**2 + assert ((1 + log(x**4))*(1 + log(x**3))).expand( + log=False) == 1 + log(x**4) + log(x**3) + log(x**4)*log(x**3) + + +def test_expand_no_multinomial(): + assert ((1 + x)*(1 + (1 + x)**4)).expand(multinomial=False) == \ + 1 + x + (1 + x)**4 + x*(1 + x)**4 + + +def test_expand_negative_integer_powers(): + expr = (x + y)**(-2) + assert expr.expand() == 1 / (2*x*y + x**2 + y**2) + assert expr.expand(multinomial=False) == (x + y)**(-2) + expr = (x + y)**(-3) + assert expr.expand() == 1 / (3*x*x*y + 3*x*y*y + x**3 + y**3) + assert expr.expand(multinomial=False) == (x + y)**(-3) + expr = (x + y)**(2) * (x + y)**(-4) + assert expr.expand() == 1 / (2*x*y + x**2 + y**2) + assert expr.expand(multinomial=False) == (x + y)**(-2) + + +def test_expand_non_commutative(): + A = Symbol('A', commutative=False) + B = Symbol('B', commutative=False) + C = Symbol('C', commutative=False) + a = Symbol('a') + b = Symbol('b') + i = Symbol('i', integer=True) + n = Symbol('n', negative=True) + m = Symbol('m', negative=True) + p = Symbol('p', polar=True) + np = Symbol('p', polar=False) + + assert (C*(A + B)).expand() == C*A + C*B + assert (C*(A + B)).expand() != A*C + B*C + assert ((A + B)**2).expand() == A**2 + A*B + B*A + B**2 + assert ((A + B)**3).expand() == (A**2*B + B**2*A + A*B**2 + B*A**2 + + A**3 + B**3 + A*B*A + B*A*B) + # issue 6219 + assert ((a*A*B*A**-1)**2).expand() == a**2*A*B**2/A + # Note that (a*A*B*A**-1)**2 is automatically converted to a**2*(A*B*A**-1)**2 + assert ((a*A*B*A**-1)**2).expand(deep=False) == a**2*(A*B*A**-1)**2 + assert ((a*A*B*A**-1)**2).expand() == a**2*(A*B**2*A**-1) + assert ((a*A*B*A**-1)**2).expand(force=True) == a**2*A*B**2*A**(-1) + assert ((a*A*B)**2).expand() == a**2*A*B*A*B + assert ((a*A)**2).expand() == a**2*A**2 + assert ((a*A*B)**i).expand() == a**i*(A*B)**i + assert ((a*A*(B*(A*B/A)**2))**i).expand() == a**i*(A*B*A*B**2/A)**i + # issue 6558 + assert (A*B*(A*B)**-1).expand() == 1 + assert ((a*A)**i).expand() == a**i*A**i + assert ((a*A*B*A**-1)**3).expand() == a**3*A*B**3/A + assert ((a*A*B*A*B/A)**3).expand() == \ + a**3*A*B*(A*B**2)*(A*B**2)*A*B*A**(-1) + assert ((a*A*B*A*B/A)**-2).expand() == \ + A*B**-1*A**-1*B**-2*A**-1*B**-1*A**-1/a**2 + assert ((a*b*A*B*A**-1)**i).expand() == a**i*b**i*(A*B/A)**i + assert ((a*(a*b)**i)**i).expand() == a**i*a**(i**2)*b**(i**2) + e = Pow(Mul(a, 1/a, A, B, evaluate=False), S(2), evaluate=False) + assert e.expand() == A*B*A*B + assert sqrt(a*(A*b)**i).expand() == sqrt(a*b**i*A**i) + assert (sqrt(-a)**a).expand() == sqrt(-a)**a + assert expand((-2*n)**(i/3)) == 2**(i/3)*(-n)**(i/3) + assert expand((-2*n*m)**(i/a)) == (-2)**(i/a)*(-n)**(i/a)*(-m)**(i/a) + assert expand((-2*a*p)**b) == 2**b*p**b*(-a)**b + assert expand((-2*a*np)**b) == 2**b*(-a*np)**b + assert expand(sqrt(A*B)) == sqrt(A*B) + assert expand(sqrt(-2*a*b)) == sqrt(2)*sqrt(-a*b) + + +def test_expand_radicals(): + a = (x + y)**R(1, 2) + + assert (a**1).expand() == a + assert (a**3).expand() == x*a + y*a + assert (a**5).expand() == x**2*a + 2*x*y*a + y**2*a + + assert (1/a**1).expand() == 1/a + assert (1/a**3).expand() == 1/(x*a + y*a) + assert (1/a**5).expand() == 1/(x**2*a + 2*x*y*a + y**2*a) + + a = (x + y)**R(1, 3) + + assert (a**1).expand() == a + assert (a**2).expand() == a**2 + assert (a**4).expand() == x*a + y*a + assert (a**5).expand() == x*a**2 + y*a**2 + assert (a**7).expand() == x**2*a + 2*x*y*a + y**2*a + + +def test_expand_modulus(): + assert ((x + y)**11).expand(modulus=11) == x**11 + y**11 + assert ((x + sqrt(2)*y)**11).expand(modulus=11) == x**11 + 10*sqrt(2)*y**11 + assert (x + y/2).expand(modulus=1) == y/2 + + raises(ValueError, lambda: ((x + y)**11).expand(modulus=0)) + raises(ValueError, lambda: ((x + y)**11).expand(modulus=x)) + + +def test_issue_5743(): + assert (x*sqrt( + x + y)*(1 + sqrt(x + y))).expand() == x**2 + x*y + x*sqrt(x + y) + assert (x*sqrt( + x + y)*(1 + x*sqrt(x + y))).expand() == x**3 + x**2*y + x*sqrt(x + y) + + +def test_expand_frac(): + assert expand((x + y)*y/x/(x + 1), frac=True) == \ + (x*y + y**2)/(x**2 + x) + assert expand((x + y)*y/x/(x + 1), numer=True) == \ + (x*y + y**2)/(x*(x + 1)) + assert expand((x + y)*y/x/(x + 1), denom=True) == \ + y*(x + y)/(x**2 + x) + eq = (x + 1)**2/y + assert expand_numer(eq, multinomial=False) == eq + # issue 26329 + eq = (exp(x*z) - exp(y*z))/exp(z*(x + y)) + ans = exp(-y*z) - exp(-x*z) + assert eq.expand(numer=True) != ans + assert eq.expand(numer=True, exact=True) == ans + assert expand_numer(eq) != ans + assert expand_numer(eq, exact=True) == ans + + +def test_issue_6121(): + eq = -I*exp(-3*I*pi/4)/(4*pi**(S(3)/2)*sqrt(x)) + assert eq.expand(complex=True) # does not give oo recursion + eq = -I*exp(-3*I*pi/4)/(4*pi**(R(3, 2))*sqrt(x)) + assert eq.expand(complex=True) # does not give oo recursion + + +def test_expand_power_base(): + assert expand_power_base((x*y*z)**4) == x**4*y**4*z**4 + assert expand_power_base((x*y*z)**x).is_Pow + assert expand_power_base((x*y*z)**x, force=True) == x**x*y**x*z**x + assert expand_power_base((x*(y*z)**2)**3) == x**3*y**6*z**6 + + assert expand_power_base((sin((x*y)**2)*y)**z).is_Pow + assert expand_power_base( + (sin((x*y)**2)*y)**z, force=True) == sin((x*y)**2)**z*y**z + assert expand_power_base( + (sin((x*y)**2)*y)**z, deep=True) == (sin(x**2*y**2)*y)**z + + assert expand_power_base(exp(x)**2) == exp(2*x) + assert expand_power_base((exp(x)*exp(y))**2) == exp(2*x)*exp(2*y) + + assert expand_power_base( + (exp((x*y)**z)*exp(y))**2) == exp(2*(x*y)**z)*exp(2*y) + assert expand_power_base((exp((x*y)**z)*exp( + y))**2, deep=True, force=True) == exp(2*x**z*y**z)*exp(2*y) + + assert expand_power_base((exp(x)*exp(y))**z).is_Pow + assert expand_power_base( + (exp(x)*exp(y))**z, force=True) == exp(x)**z*exp(y)**z + + +def test_expand_arit(): + a = Symbol("a") + b = Symbol("b", positive=True) + c = Symbol("c") + + p = R(5) + e = (a + b)*c + assert e == c*(a + b) + assert (e.expand() - a*c - b*c) == R(0) + e = (a + b)*(a + b) + assert e == (a + b)**2 + assert e.expand() == 2*a*b + a**2 + b**2 + e = (a + b)*(a + b)**R(2) + assert e == (a + b)**3 + assert e.expand() == 3*b*a**2 + 3*a*b**2 + a**3 + b**3 + assert e.expand() == 3*b*a**2 + 3*a*b**2 + a**3 + b**3 + e = (a + b)*(a + c)*(b + c) + assert e == (a + c)*(a + b)*(b + c) + assert e.expand() == 2*a*b*c + b*a**2 + c*a**2 + b*c**2 + a*c**2 + c*b**2 + a*b**2 + e = (a + R(1))**p + assert e == (1 + a)**5 + assert e.expand() == 1 + 5*a + 10*a**2 + 10*a**3 + 5*a**4 + a**5 + e = (a + b + c)*(a + c + p) + assert e == (5 + a + c)*(a + b + c) + assert e.expand() == 5*a + 5*b + 5*c + 2*a*c + b*c + a*b + a**2 + c**2 + x = Symbol("x") + s = exp(x*x) - 1 + e = s.nseries(x, 0, 6)/x**2 + assert e.expand() == 1 + x**2/2 + O(x**4) + + e = (x*(y + z))**(x*(y + z))*(x + y) + assert e.expand(power_exp=False, power_base=False) == x*(x*y + x* + z)**(x*y + x*z) + y*(x*y + x*z)**(x*y + x*z) + assert e.expand(power_exp=False, power_base=False, deep=False) == x* \ + (x*(y + z))**(x*(y + z)) + y*(x*(y + z))**(x*(y + z)) + e = x * (x + (y + 1)**2) + assert e.expand(deep=False) == x**2 + x*(y + 1)**2 + e = (x*(y + z))**z + assert e.expand(power_base=True, mul=True, deep=True) in [x**z*(y + + z)**z, (x*y + x*z)**z] + assert ((2*y)**z).expand() == 2**z*y**z + p = Symbol('p', positive=True) + assert sqrt(-x).expand().is_Pow + assert sqrt(-x).expand(force=True) == I*sqrt(x) + assert ((2*y*p)**z).expand() == 2**z*p**z*y**z + assert ((2*y*p*x)**z).expand() == 2**z*p**z*(x*y)**z + assert ((2*y*p*x)**z).expand(force=True) == 2**z*p**z*x**z*y**z + assert ((2*y*p*-pi)**z).expand() == 2**z*pi**z*p**z*(-y)**z + assert ((2*y*p*-pi*x)**z).expand() == 2**z*pi**z*p**z*(-x*y)**z + n = Symbol('n', negative=True) + m = Symbol('m', negative=True) + assert ((-2*x*y*n)**z).expand() == 2**z*(-n)**z*(x*y)**z + assert ((-2*x*y*n*m)**z).expand() == 2**z*(-m)**z*(-n)**z*(-x*y)**z + # issue 5482 + assert sqrt(-2*x*n) == sqrt(2)*sqrt(-n)*sqrt(x) + # issue 5605 (2) + assert (cos(x + y)**2).expand(trig=True) in [ + (-sin(x)*sin(y) + cos(x)*cos(y))**2, + sin(x)**2*sin(y)**2 - 2*sin(x)*sin(y)*cos(x)*cos(y) + cos(x)**2*cos(y)**2 + ] + + # Check that this isn't too slow + x = Symbol('x') + W = 1 + for i in range(1, 21): + W = W * (x - i) + W = W.expand() + assert W.has(-1672280820*x**15) + +def test_expand_mul(): + # part of issue 20597 + e = Mul(2, 3, evaluate=False) + assert e.expand() == 6 + + e = Mul(2, 3, 1/x, evaluate=False) + assert e.expand() == 6/x + e = Mul(2, R(1, 3), evaluate=False) + assert e.expand() == R(2, 3) + +def test_power_expand(): + """Test for Pow.expand()""" + a = Symbol('a') + b = Symbol('b') + p = (a + b)**2 + assert p.expand() == a**2 + b**2 + 2*a*b + + p = (1 + 2*(1 + a))**2 + assert p.expand() == 9 + 4*(a**2) + 12*a + + p = 2**(a + b) + assert p.expand() == 2**a*2**b + + A = Symbol('A', commutative=False) + B = Symbol('B', commutative=False) + assert (2**(A + B)).expand() == 2**(A + B) + assert (A**(a + b)).expand() != A**(a + b) + + +def test_issues_5919_6830(): + # issue 5919 + n = -1 + 1/x + z = n/x/(-n)**2 - 1/n/x + assert expand(z) == 1/(x**2 - 2*x + 1) - 1/(x - 2 + 1/x) - 1/(-x + 1) + + # issue 6830 + p = (1 + x)**2 + assert expand_multinomial((1 + x*p)**2) == ( + x**2*(x**4 + 4*x**3 + 6*x**2 + 4*x + 1) + 2*x*(x**2 + 2*x + 1) + 1) + assert expand_multinomial((1 + (y + x)*p)**2) == ( + 2*((x + y)*(x**2 + 2*x + 1)) + (x**2 + 2*x*y + y**2)* + (x**4 + 4*x**3 + 6*x**2 + 4*x + 1) + 1) + A = Symbol('A', commutative=False) + p = (1 + A)**2 + assert expand_multinomial((1 + x*p)**2) == ( + x**2*(1 + 4*A + 6*A**2 + 4*A**3 + A**4) + 2*x*(1 + 2*A + A**2) + 1) + assert expand_multinomial((1 + (y + x)*p)**2) == ( + (x + y)*(1 + 2*A + A**2)*2 + (x**2 + 2*x*y + y**2)* + (1 + 4*A + 6*A**2 + 4*A**3 + A**4) + 1) + assert expand_multinomial((1 + (y + x)*p)**3) == ( + (x + y)*(1 + 2*A + A**2)*3 + (x**2 + 2*x*y + y**2)*(1 + 4*A + + 6*A**2 + 4*A**3 + A**4)*3 + (x**3 + 3*x**2*y + 3*x*y**2 + y**3)*(1 + 6*A + + 15*A**2 + 20*A**3 + 15*A**4 + 6*A**5 + A**6) + 1) + # unevaluate powers + eq = (Pow((x + 1)*((A + 1)**2), 2, evaluate=False)) + # - in this case the base is not an Add so no further + # expansion is done + assert expand_multinomial(eq) == \ + (x**2 + 2*x + 1)*(1 + 4*A + 6*A**2 + 4*A**3 + A**4) + # - but here, the expanded base *is* an Add so it gets expanded + eq = (Pow(((A + 1)**2), 2, evaluate=False)) + assert expand_multinomial(eq) == 1 + 4*A + 6*A**2 + 4*A**3 + A**4 + + # coverage + def ok(a, b, n): + e = (a + I*b)**n + return verify_numerically(e, expand_multinomial(e)) + + for a in [2, S.Half]: + for b in [3, R(1, 3)]: + for n in range(2, 6): + assert ok(a, b, n) + + assert expand_multinomial((x + 1 + O(z))**2) == \ + 1 + 2*x + x**2 + O(z) + assert expand_multinomial((x + 1 + O(z))**3) == \ + 1 + 3*x + 3*x**2 + x**3 + O(z) + + assert expand_multinomial(3**(x + y + 3)) == 27*3**(x + y) + +def test_expand_log(): + t = Symbol('t', positive=True) + # after first expansion, -2*log(2) + log(4); then 0 after second + assert expand(log(t**2) - log(t**2/4) - 2*log(2)) == 0 + assert expand_log(log(7*6)/log(6)) == 1 + log(7)/log(6) + b = factorial(10) + assert expand_log(log(7*b**4)/log(b) + ) == 4 + log(7)/log(b) + + +def test_issue_23952(): + assert (x**(y + z)).expand(force=True) == x**y*x**z + one = Symbol('1', integer=True, prime=True, odd=True, positive=True) + two = Symbol('2', integer=True, prime=True, even=True) + e = two - one + for b in (0, x): + # 0**e = 0, 0**-e = zoo; but if expanded then nan + assert unchanged(Pow, b, e) # power_exp + assert unchanged(Pow, b, -e) # power_exp + assert unchanged(Pow, b, y - x) # power_exp + assert unchanged(Pow, b, 3 - x) # multinomial + assert (b**e).expand().is_Pow # power_exp + assert (b**-e).expand().is_Pow # power_exp + assert (b**(y - x)).expand().is_Pow # power_exp + assert (b**(3 - x)).expand().is_Pow # multinomial + nn1 = Symbol('nn1', nonnegative=True) + nn2 = Symbol('nn2', nonnegative=True) + nn3 = Symbol('nn3', nonnegative=True) + assert (x**(nn1 + nn2)).expand() == x**nn1*x**nn2 + assert (x**(-nn1 - nn2)).expand() == x**-nn1*x**-nn2 + assert unchanged(Pow, x, nn1 + nn2 - nn3) + assert unchanged(Pow, x, 1 + nn2 - nn3) + assert unchanged(Pow, x, nn1 - nn2) + assert unchanged(Pow, x, 1 - nn2) + assert unchanged(Pow, x, -1 + nn2) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expr.py new file mode 100644 index 0000000000000000000000000000000000000000..af63823345e2b0564ebb7e9015bfe1b423c9bafa --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_expr.py @@ -0,0 +1,2313 @@ +from sympy.assumptions.refine import refine +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.expr import (ExprBuilder, unchanged, Expr, + UnevaluatedExpr) +from sympy.core.function import (Function, expand, WildFunction, + AppliedUndef, Derivative, diff, Subs) +from sympy.core.mul import Mul, _unevaluated_Mul +from sympy.core.numbers import (NumberSymbol, E, zoo, oo, Float, I, + Rational, nan, Integer, Number, pi, _illegal) +from sympy.core.power import Pow +from sympy.core.relational import Ge, Lt, Gt, Le +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Symbol, symbols, Dummy, Wild +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import exp_polar, exp, log +from sympy.functions.elementary.hyperbolic import sinh, tanh +from sympy.functions.elementary.miscellaneous import sqrt, Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import tan, sin, cos +from sympy.functions.special.delta_functions import (Heaviside, + DiracDelta) +from sympy.functions.special.error_functions import Si +from sympy.functions.special.gamma_functions import gamma +from sympy.integrals.integrals import integrate, Integral +from sympy.physics.secondquant import FockState +from sympy.polys.partfrac import apart +from sympy.polys.polytools import factor, cancel, Poly +from sympy.polys.rationaltools import together +from sympy.series.order import O +from sympy.sets.sets import FiniteSet +from sympy.simplify.combsimp import combsimp +from sympy.simplify.gammasimp import gammasimp +from sympy.simplify.powsimp import powsimp +from sympy.simplify.radsimp import collect, radsimp +from sympy.simplify.ratsimp import ratsimp +from sympy.simplify.simplify import simplify, nsimplify +from sympy.simplify.trigsimp import trigsimp +from sympy.tensor.indexed import Indexed +from sympy.physics.units import meter + +from sympy.testing.pytest import raises, XFAIL + +from sympy.abc import a, b, c, n, t, u, x, y, z + + +f, g, h = symbols('f,g,h', cls=Function) + + +class DummyNumber: + """ + Minimal implementation of a number that works with SymPy. + + If one has a Number class (e.g. Sage Integer, or some other custom class) + that one wants to work well with SymPy, one has to implement at least the + methods of this class DummyNumber, resp. its subclasses I5 and F1_1. + + Basically, one just needs to implement either __int__() or __float__() and + then one needs to make sure that the class works with Python integers and + with itself. + """ + + def __radd__(self, a): + if isinstance(a, (int, float)): + return a + self.number + return NotImplemented + + def __add__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number + a + return NotImplemented + + def __rsub__(self, a): + if isinstance(a, (int, float)): + return a - self.number + return NotImplemented + + def __sub__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number - a + return NotImplemented + + def __rmul__(self, a): + if isinstance(a, (int, float)): + return a * self.number + return NotImplemented + + def __mul__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number * a + return NotImplemented + + def __rtruediv__(self, a): + if isinstance(a, (int, float)): + return a / self.number + return NotImplemented + + def __truediv__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number / a + return NotImplemented + + def __rpow__(self, a): + if isinstance(a, (int, float)): + return a ** self.number + return NotImplemented + + def __pow__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number ** a + return NotImplemented + + def __pos__(self): + return self.number + + def __neg__(self): + return - self.number + + +class I5(DummyNumber): + number = 5 + + def __int__(self): + return self.number + + +class F1_1(DummyNumber): + number = 1.1 + + def __float__(self): + return self.number + +i5 = I5() +f1_1 = F1_1() + +# basic SymPy objects +basic_objs = [ + Rational(2), + Float("1.3"), + x, + y, + pow(x, y)*y, +] + +# all supported objects +all_objs = basic_objs + [ + 5, + 5.5, + i5, + f1_1 +] + + +def dotest(s): + for xo in all_objs: + for yo in all_objs: + s(xo, yo) + return True + + +def test_basic(): + def j(a, b): + x = a + x = +a + x = -a + x = a + b + x = a - b + x = a*b + x = a/b + x = a**b + del x + assert dotest(j) + + +def test_ibasic(): + def s(a, b): + x = a + x += b + x = a + x -= b + x = a + x *= b + x = a + x /= b + assert dotest(s) + + +class NonBasic: + '''This class represents an object that knows how to implement binary + operations like +, -, etc with Expr but is not a subclass of Basic itself. + The NonExpr subclass below does subclass Basic but not Expr. + + For both NonBasic and NonExpr it should be possible for them to override + Expr.__add__ etc because Expr.__add__ should be returning NotImplemented + for non Expr classes. Otherwise Expr.__add__ would create meaningless + objects like Add(Integer(1), FiniteSet(2)) and it wouldn't be possible for + other classes to override these operations when interacting with Expr. + ''' + def __add__(self, other): + return SpecialOp('+', self, other) + + def __radd__(self, other): + return SpecialOp('+', other, self) + + def __sub__(self, other): + return SpecialOp('-', self, other) + + def __rsub__(self, other): + return SpecialOp('-', other, self) + + def __mul__(self, other): + return SpecialOp('*', self, other) + + def __rmul__(self, other): + return SpecialOp('*', other, self) + + def __truediv__(self, other): + return SpecialOp('/', self, other) + + def __rtruediv__(self, other): + return SpecialOp('/', other, self) + + def __floordiv__(self, other): + return SpecialOp('//', self, other) + + def __rfloordiv__(self, other): + return SpecialOp('//', other, self) + + def __mod__(self, other): + return SpecialOp('%', self, other) + + def __rmod__(self, other): + return SpecialOp('%', other, self) + + def __divmod__(self, other): + return SpecialOp('divmod', self, other) + + def __rdivmod__(self, other): + return SpecialOp('divmod', other, self) + + def __pow__(self, other): + return SpecialOp('**', self, other) + + def __rpow__(self, other): + return SpecialOp('**', other, self) + + def __lt__(self, other): + return SpecialOp('<', self, other) + + def __gt__(self, other): + return SpecialOp('>', self, other) + + def __le__(self, other): + return SpecialOp('<=', self, other) + + def __ge__(self, other): + return SpecialOp('>=', self, other) + + +class NonExpr(Basic, NonBasic): + '''Like NonBasic above except this is a subclass of Basic but not Expr''' + pass + + +class SpecialOp(): + '''Represents the results of operations with NonBasic and NonExpr''' + def __new__(cls, op, arg1, arg2): + obj = object.__new__(cls) + obj.args = (op, arg1, arg2) + return obj + + +class NonArithmetic(Basic): + '''Represents a Basic subclass that does not support arithmetic operations''' + pass + + +def test_cooperative_operations(): + '''Tests that Expr uses binary operations cooperatively. + + In particular it should be possible for non-Expr classes to override + binary operators like +, - etc when used with Expr instances. This should + work for non-Expr classes whether they are Basic subclasses or not. Also + non-Expr classes that do not define binary operators with Expr should give + TypeError. + ''' + # A bunch of instances of Expr subclasses + exprs = [ + Expr(), + S.Zero, + S.One, + S.Infinity, + S.NegativeInfinity, + S.ComplexInfinity, + S.Half, + Float(0.5), + Integer(2), + Symbol('x'), + Mul(2, Symbol('x')), + Add(2, Symbol('x')), + Pow(2, Symbol('x')), + ] + + for e in exprs: + # Test that these classes can override arithmetic operations in + # combination with various Expr types. + for ne in [NonBasic(), NonExpr()]: + + results = [ + (ne + e, ('+', ne, e)), + (e + ne, ('+', e, ne)), + (ne - e, ('-', ne, e)), + (e - ne, ('-', e, ne)), + (ne * e, ('*', ne, e)), + (e * ne, ('*', e, ne)), + (ne / e, ('/', ne, e)), + (e / ne, ('/', e, ne)), + (ne // e, ('//', ne, e)), + (e // ne, ('//', e, ne)), + (ne % e, ('%', ne, e)), + (e % ne, ('%', e, ne)), + (divmod(ne, e), ('divmod', ne, e)), + (divmod(e, ne), ('divmod', e, ne)), + (ne ** e, ('**', ne, e)), + (e ** ne, ('**', e, ne)), + (e < ne, ('>', ne, e)), + (ne < e, ('<', ne, e)), + (e > ne, ('<', ne, e)), + (ne > e, ('>', ne, e)), + (e <= ne, ('>=', ne, e)), + (ne <= e, ('<=', ne, e)), + (e >= ne, ('<=', ne, e)), + (ne >= e, ('>=', ne, e)), + ] + + for res, args in results: + assert type(res) is SpecialOp and res.args == args + + # These classes do not support binary operators with Expr. Every + # operation should raise in combination with any of the Expr types. + for na in [NonArithmetic(), object()]: + + raises(TypeError, lambda : e + na) + raises(TypeError, lambda : na + e) + raises(TypeError, lambda : e - na) + raises(TypeError, lambda : na - e) + raises(TypeError, lambda : e * na) + raises(TypeError, lambda : na * e) + raises(TypeError, lambda : e / na) + raises(TypeError, lambda : na / e) + raises(TypeError, lambda : e // na) + raises(TypeError, lambda : na // e) + raises(TypeError, lambda : e % na) + raises(TypeError, lambda : na % e) + raises(TypeError, lambda : divmod(e, na)) + raises(TypeError, lambda : divmod(na, e)) + raises(TypeError, lambda : e ** na) + raises(TypeError, lambda : na ** e) + raises(TypeError, lambda : e > na) + raises(TypeError, lambda : na > e) + raises(TypeError, lambda : e < na) + raises(TypeError, lambda : na < e) + raises(TypeError, lambda : e >= na) + raises(TypeError, lambda : na >= e) + raises(TypeError, lambda : e <= na) + raises(TypeError, lambda : na <= e) + + +def test_relational(): + from sympy.core.relational import Lt + assert (pi < 3) is S.false + assert (pi <= 3) is S.false + assert (pi > 3) is S.true + assert (pi >= 3) is S.true + assert (-pi < 3) is S.true + assert (-pi <= 3) is S.true + assert (-pi > 3) is S.false + assert (-pi >= 3) is S.false + r = Symbol('r', real=True) + assert (r - 2 < r - 3) is S.false + assert Lt(x + I, x + I + 2).func == Lt # issue 8288 + + +def test_relational_assumptions(): + m1 = Symbol("m1", nonnegative=False) + m2 = Symbol("m2", positive=False) + m3 = Symbol("m3", nonpositive=False) + m4 = Symbol("m4", negative=False) + assert (m1 < 0) == Lt(m1, 0) + assert (m2 <= 0) == Le(m2, 0) + assert (m3 > 0) == Gt(m3, 0) + assert (m4 >= 0) == Ge(m4, 0) + m1 = Symbol("m1", nonnegative=False, real=True) + m2 = Symbol("m2", positive=False, real=True) + m3 = Symbol("m3", nonpositive=False, real=True) + m4 = Symbol("m4", negative=False, real=True) + assert (m1 < 0) is S.true + assert (m2 <= 0) is S.true + assert (m3 > 0) is S.true + assert (m4 >= 0) is S.true + m1 = Symbol("m1", negative=True) + m2 = Symbol("m2", nonpositive=True) + m3 = Symbol("m3", positive=True) + m4 = Symbol("m4", nonnegative=True) + assert (m1 < 0) is S.true + assert (m2 <= 0) is S.true + assert (m3 > 0) is S.true + assert (m4 >= 0) is S.true + m1 = Symbol("m1", negative=False, real=True) + m2 = Symbol("m2", nonpositive=False, real=True) + m3 = Symbol("m3", positive=False, real=True) + m4 = Symbol("m4", nonnegative=False, real=True) + assert (m1 < 0) is S.false + assert (m2 <= 0) is S.false + assert (m3 > 0) is S.false + assert (m4 >= 0) is S.false + + +# See https://github.com/sympy/sympy/issues/17708 +#def test_relational_noncommutative(): +# from sympy import Lt, Gt, Le, Ge +# A, B = symbols('A,B', commutative=False) +# assert (A < B) == Lt(A, B) +# assert (A <= B) == Le(A, B) +# assert (A > B) == Gt(A, B) +# assert (A >= B) == Ge(A, B) + + +def test_basic_nostr(): + for obj in basic_objs: + raises(TypeError, lambda: obj + '1') + raises(TypeError, lambda: obj - '1') + if obj == 2: + assert obj * '1' == '11' + else: + raises(TypeError, lambda: obj * '1') + raises(TypeError, lambda: obj / '1') + raises(TypeError, lambda: obj ** '1') + + +def test_series_expansion_for_uniform_order(): + assert (1/x + y + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + x).series(x, 0, 1) == 1/x + y + O(x) + assert (1/x + 1 + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + 1 + x).series(x, 0, 1) == 1/x + 1 + O(x) + assert (1/x + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + y*x + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + y*x + x).series(x, 0, 1) == 1/x + y + O(x) + + +def test_leadterm(): + assert (3 + 2*x**(log(3)/log(2) - 1)).leadterm(x) == (3, 0) + + assert (1/x**2 + 1 + x + x**2).leadterm(x)[1] == -2 + assert (1/x + 1 + x + x**2).leadterm(x)[1] == -1 + assert (x**2 + 1/x).leadterm(x)[1] == -1 + assert (1 + x**2).leadterm(x)[1] == 0 + assert (x + 1).leadterm(x)[1] == 0 + assert (x + x**2).leadterm(x)[1] == 1 + assert (x**2).leadterm(x)[1] == 2 + + +def test_as_leading_term(): + assert (3 + 2*x**(log(3)/log(2) - 1)).as_leading_term(x) == 3 + assert (1/x**2 + 1 + x + x**2).as_leading_term(x) == 1/x**2 + assert (1/x + 1 + x + x**2).as_leading_term(x) == 1/x + assert (x**2 + 1/x).as_leading_term(x) == 1/x + assert (1 + x**2).as_leading_term(x) == 1 + assert (x + 1).as_leading_term(x) == 1 + assert (x + x**2).as_leading_term(x) == x + assert (x**2).as_leading_term(x) == x**2 + assert (x + oo).as_leading_term(x) is oo + + raises(ValueError, lambda: (x + 1).as_leading_term(1)) + + # https://github.com/sympy/sympy/issues/21177 + e = -3*x + (x + Rational(3, 2) - sqrt(3)*S.ImaginaryUnit/2)**2\ + - Rational(3, 2) + 3*sqrt(3)*S.ImaginaryUnit/2 + assert e.as_leading_term(x) == -sqrt(3)*I*x + + # https://github.com/sympy/sympy/issues/21245 + e = 1 - x - x**2 + d = (1 + sqrt(5))/2 + assert e.subs(x, y + 1/d).as_leading_term(y) == \ + (-40*y - 16*sqrt(5)*y)/(16 + 8*sqrt(5)) + + # https://github.com/sympy/sympy/issues/26991 + assert sinh(tanh(3/(100*x))).as_leading_term(x, cdir = 1) == sinh(1) + + +def test_leadterm2(): + assert (x*cos(1)*cos(1 + sin(1)) + sin(1 + sin(1))).leadterm(x) == \ + (sin(1 + sin(1)), 0) + + +def test_leadterm3(): + assert (y + z + x).leadterm(x) == (y + z, 0) + + +def test_as_leading_term2(): + assert (x*cos(1)*cos(1 + sin(1)) + sin(1 + sin(1))).as_leading_term(x) == \ + sin(1 + sin(1)) + + +def test_as_leading_term3(): + assert (2 + pi + x).as_leading_term(x) == 2 + pi + assert (2*x + pi*x + x**2).as_leading_term(x) == 2*x + pi*x + + +def test_as_leading_term4(): + # see issue 6843 + n = Symbol('n', integer=True, positive=True) + r = -n**3/(2*n**2 + 4*n + 2) - n**2/(n**2 + 2*n + 1) + \ + n**2/(n + 1) - n/(2*n**2 + 4*n + 2) + n/(n*x + x) + 2*n/(n + 1) - \ + 1 + 1/(n*x + x) + 1/(n + 1) - 1/x + assert r.as_leading_term(x).cancel() == n/2 + + +def test_as_leading_term_stub(): + class foo(Function): + pass + assert foo(1/x).as_leading_term(x) == foo(1/x) + assert foo(1).as_leading_term(x) == foo(1) + raises(NotImplementedError, lambda: foo(x).as_leading_term(x)) + + +def test_as_leading_term_deriv_integral(): + # related to issue 11313 + assert Derivative(x ** 3, x).as_leading_term(x) == 3*x**2 + assert Derivative(x ** 3, y).as_leading_term(x) == 0 + + assert Integral(x ** 3, x).as_leading_term(x) == x**4/4 + assert Integral(x ** 3, y).as_leading_term(x) == y*x**3 + + assert Derivative(exp(x), x).as_leading_term(x) == 1 + assert Derivative(log(x), x).as_leading_term(x) == (1/x).as_leading_term(x) + + +def test_atoms(): + assert x.atoms() == {x} + assert (1 + x).atoms() == {x, S.One} + + assert (1 + 2*cos(x)).atoms(Symbol) == {x} + assert (1 + 2*cos(x)).atoms(Symbol, Number) == {S.One, S(2), x} + + assert (2*(x**(y**x))).atoms() == {S(2), x, y} + + assert S.Half.atoms() == {S.Half} + assert S.Half.atoms(Symbol) == set() + + assert sin(oo).atoms(oo) == set() + + assert Poly(0, x).atoms() == {S.Zero, x} + assert Poly(1, x).atoms() == {S.One, x} + + assert Poly(x, x).atoms() == {x} + assert Poly(x, x, y).atoms() == {x, y} + assert Poly(x + y, x, y).atoms() == {x, y} + assert Poly(x + y, x, y, z).atoms() == {x, y, z} + assert Poly(x + y*t, x, y, z).atoms() == {t, x, y, z} + + assert (I*pi).atoms(NumberSymbol) == {pi} + assert (I*pi).atoms(NumberSymbol, I) == \ + (I*pi).atoms(I, NumberSymbol) == {pi, I} + + assert exp(exp(x)).atoms(exp) == {exp(exp(x)), exp(x)} + assert (1 + x*(2 + y) + exp(3 + z)).atoms(Add) == \ + {1 + x*(2 + y) + exp(3 + z), 2 + y, 3 + z} + + # issue 6132 + e = (f(x) + sin(x) + 2) + assert e.atoms(AppliedUndef) == \ + {f(x)} + assert e.atoms(AppliedUndef, Function) == \ + {f(x), sin(x)} + assert e.atoms(Function) == \ + {f(x), sin(x)} + assert e.atoms(AppliedUndef, Number) == \ + {f(x), S(2)} + assert e.atoms(Function, Number) == \ + {S(2), sin(x), f(x)} + + +def test_is_polynomial(): + k = Symbol('k', nonnegative=True, integer=True) + + assert Rational(2).is_polynomial(x, y, z) is True + assert (S.Pi).is_polynomial(x, y, z) is True + + assert x.is_polynomial(x) is True + assert x.is_polynomial(y) is True + + assert (x**2).is_polynomial(x) is True + assert (x**2).is_polynomial(y) is True + + assert (x**(-2)).is_polynomial(x) is False + assert (x**(-2)).is_polynomial(y) is True + + assert (2**x).is_polynomial(x) is False + assert (2**x).is_polynomial(y) is True + + assert (x**k).is_polynomial(x) is False + assert (x**k).is_polynomial(k) is False + assert (x**x).is_polynomial(x) is False + assert (k**k).is_polynomial(k) is False + assert (k**x).is_polynomial(k) is False + + assert (x**(-k)).is_polynomial(x) is False + assert ((2*x)**k).is_polynomial(x) is False + + assert (x**2 + 3*x - 8).is_polynomial(x) is True + assert (x**2 + 3*x - 8).is_polynomial(y) is True + + assert (x**2 + 3*x - 8).is_polynomial() is True + + assert sqrt(x).is_polynomial(x) is False + assert (sqrt(x)**3).is_polynomial(x) is False + + assert (x**2 + 3*x*sqrt(y) - 8).is_polynomial(x) is True + assert (x**2 + 3*x*sqrt(y) - 8).is_polynomial(y) is False + + assert ((x**2)*(y**2) + x*(y**2) + y*x + exp(2)).is_polynomial() is True + assert ((x**2)*(y**2) + x*(y**2) + y*x + exp(x)).is_polynomial() is False + + assert ( + (x**2)*(y**2) + x*(y**2) + y*x + exp(2)).is_polynomial(x, y) is True + assert ( + (x**2)*(y**2) + x*(y**2) + y*x + exp(x)).is_polynomial(x, y) is False + + assert (1/f(x) + 1).is_polynomial(f(x)) is False + + +def test_is_rational_function(): + assert Integer(1).is_rational_function() is True + assert Integer(1).is_rational_function(x) is True + + assert Rational(17, 54).is_rational_function() is True + assert Rational(17, 54).is_rational_function(x) is True + + assert (12/x).is_rational_function() is True + assert (12/x).is_rational_function(x) is True + + assert (x/y).is_rational_function() is True + assert (x/y).is_rational_function(x) is True + assert (x/y).is_rational_function(x, y) is True + + assert (x**2 + 1/x/y).is_rational_function() is True + assert (x**2 + 1/x/y).is_rational_function(x) is True + assert (x**2 + 1/x/y).is_rational_function(x, y) is True + + assert (sin(y)/x).is_rational_function() is False + assert (sin(y)/x).is_rational_function(y) is False + assert (sin(y)/x).is_rational_function(x) is True + assert (sin(y)/x).is_rational_function(x, y) is False + + for i in _illegal: + assert not i.is_rational_function() + for d in (1, x): + assert not (i/d).is_rational_function() + + +def test_is_meromorphic(): + f = a/x**2 + b + x + c*x**2 + assert f.is_meromorphic(x, 0) is True + assert f.is_meromorphic(x, 1) is True + assert f.is_meromorphic(x, zoo) is True + + g = 3 + 2*x**(log(3)/log(2) - 1) + assert g.is_meromorphic(x, 0) is False + assert g.is_meromorphic(x, 1) is True + assert g.is_meromorphic(x, zoo) is False + + n = Symbol('n', integer=True) + e = sin(1/x)**n*x + assert e.is_meromorphic(x, 0) is False + assert e.is_meromorphic(x, 1) is True + assert e.is_meromorphic(x, zoo) is False + + e = log(x)**pi + assert e.is_meromorphic(x, 0) is False + assert e.is_meromorphic(x, 1) is False + assert e.is_meromorphic(x, 2) is True + assert e.is_meromorphic(x, zoo) is False + + assert (log(x)**a).is_meromorphic(x, 0) is False + assert (log(x)**a).is_meromorphic(x, 1) is False + assert (a**log(x)).is_meromorphic(x, 0) is None + assert (3**log(x)).is_meromorphic(x, 0) is False + assert (3**log(x)).is_meromorphic(x, 1) is True + +def test_is_algebraic_expr(): + assert sqrt(3).is_algebraic_expr(x) is True + assert sqrt(3).is_algebraic_expr() is True + + eq = ((1 + x**2)/(1 - y**2))**(S.One/3) + assert eq.is_algebraic_expr(x) is True + assert eq.is_algebraic_expr(y) is True + + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr(x) is True + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr(y) is True + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr() is True + + assert (cos(y)/sqrt(x)).is_algebraic_expr() is False + assert (cos(y)/sqrt(x)).is_algebraic_expr(x) is True + assert (cos(y)/sqrt(x)).is_algebraic_expr(y) is False + assert (cos(y)/sqrt(x)).is_algebraic_expr(x, y) is False + + +def test_SAGE1(): + #see https://github.com/sympy/sympy/issues/3346 + class MyInt: + def _sympy_(self): + return Integer(5) + m = MyInt() + e = Rational(2)*m + assert e == 10 + + raises(TypeError, lambda: Rational(2)*MyInt) + + +def test_SAGE2(): + class MyInt: + def __int__(self): + return 5 + assert sympify(MyInt()) == 5 + e = Rational(2)*MyInt() + assert e == 10 + + raises(TypeError, lambda: Rational(2)*MyInt) + + +def test_SAGE3(): + class MySymbol: + def __rmul__(self, other): + return ('mys', other, self) + + o = MySymbol() + e = x*o + + assert e == ('mys', x, o) + + +def test_len(): + e = x*y + assert len(e.args) == 2 + e = x + y + z + assert len(e.args) == 3 + + +def test_doit(): + a = Integral(x**2, x) + + assert isinstance(a.doit(), Integral) is False + + assert isinstance(a.doit(integrals=True), Integral) is False + assert isinstance(a.doit(integrals=False), Integral) is True + + assert (2*Integral(x, x)).doit() == x**2 + + +def test_attribute_error(): + raises(AttributeError, lambda: x.cos()) + raises(AttributeError, lambda: x.sin()) + raises(AttributeError, lambda: x.exp()) + + +def test_args(): + assert (x*y).args in ((x, y), (y, x)) + assert (x + y).args in ((x, y), (y, x)) + assert (x*y + 1).args in ((x*y, 1), (1, x*y)) + assert sin(x*y).args == (x*y,) + assert sin(x*y).args[0] == x*y + assert (x**y).args == (x, y) + assert (x**y).args[0] == x + assert (x**y).args[1] == y + + +def test_noncommutative_expand_issue_3757(): + A, B, C = symbols('A,B,C', commutative=False) + assert A*B - B*A != 0 + assert (A*(A + B)*B).expand() == A**2*B + A*B**2 + assert (A*(A + B + C)*B).expand() == A**2*B + A*B**2 + A*C*B + + +def test_as_numer_denom(): + a, b, c = symbols('a, b, c') + + assert nan.as_numer_denom() == (nan, 1) + assert oo.as_numer_denom() == (oo, 1) + assert (-oo).as_numer_denom() == (-oo, 1) + assert zoo.as_numer_denom() == (zoo, 1) + assert (-zoo).as_numer_denom() == (zoo, 1) + + assert x.as_numer_denom() == (x, 1) + assert (1/x).as_numer_denom() == (1, x) + assert (x/y).as_numer_denom() == (x, y) + assert (x/2).as_numer_denom() == (x, 2) + assert (x*y/z).as_numer_denom() == (x*y, z) + assert (x/(y*z)).as_numer_denom() == (x, y*z) + assert S.Half.as_numer_denom() == (1, 2) + assert (1/y**2).as_numer_denom() == (1, y**2) + assert (x/y**2).as_numer_denom() == (x, y**2) + assert ((x**2 + 1)/y).as_numer_denom() == (x**2 + 1, y) + assert (x*(y + 1)/y**7).as_numer_denom() == (x*(y + 1), y**7) + assert (x**-2).as_numer_denom() == (1, x**2) + assert (a/x + b/2/x + c/3/x).as_numer_denom() == \ + (6*a + 3*b + 2*c, 6*x) + assert (a/x + b/2/x + c/3/y).as_numer_denom() == \ + (2*c*x + y*(6*a + 3*b), 6*x*y) + assert (a/x + b/2/x + c/.5/x).as_numer_denom() == \ + (2*a + b + 4.0*c, 2*x) + # this should take no more than a few seconds + assert int(log(Add(*[Dummy()/i/x for i in range(1, 705)] + ).as_numer_denom()[1]/x).n(4)) == 705 + for i in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + assert (i + x/3).as_numer_denom() == \ + (x + i, 3) + assert (S.Infinity + x/3 + y/4).as_numer_denom() == \ + (4*x + 3*y + S.Infinity, 12) + assert (oo*x + zoo*y).as_numer_denom() == \ + (zoo*y + oo*x, 1) + + A, B, C = symbols('A,B,C', commutative=False) + + assert (A*B*C**-1).as_numer_denom() == (A*B*C**-1, 1) + assert (A*B*C**-1/x).as_numer_denom() == (A*B*C**-1, x) + assert (C**-1*A*B).as_numer_denom() == (C**-1*A*B, 1) + assert (C**-1*A*B/x).as_numer_denom() == (C**-1*A*B, x) + assert ((A*B*C)**-1).as_numer_denom() == ((A*B*C)**-1, 1) + assert ((A*B*C)**-1/x).as_numer_denom() == ((A*B*C)**-1, x) + + # the following morphs from Add to Mul during processing + assert Add(0, (x + y)/z/-2, evaluate=False).as_numer_denom( + ) == (-x - y, 2*z) + + +def test_trunc(): + import math + x, y = symbols('x y') + assert math.trunc(2) == 2 + assert math.trunc(4.57) == 4 + assert math.trunc(-5.79) == -5 + assert math.trunc(pi) == 3 + assert math.trunc(log(7)) == 1 + assert math.trunc(exp(5)) == 148 + assert math.trunc(cos(pi)) == -1 + assert math.trunc(sin(5)) == 0 + + raises(TypeError, lambda: math.trunc(x)) + raises(TypeError, lambda: math.trunc(x + y**2)) + raises(TypeError, lambda: math.trunc(oo)) + + +def test_as_independent(): + assert S.Zero.as_independent(x, as_Add=True) == (0, 0) + assert S.Zero.as_independent(x, as_Add=False) == (0, 0) + assert (2*x*sin(x) + y + x).as_independent(x) == (y, x + 2*x*sin(x)) + assert (2*x*sin(x) + y + x).as_independent(y) == (x + 2*x*sin(x), y) + + assert (2*x*sin(x) + y + x).as_independent(x, y) == (0, y + x + 2*x*sin(x)) + + assert (x*sin(x)*cos(y)).as_independent(x) == (cos(y), x*sin(x)) + assert (x*sin(x)*cos(y)).as_independent(y) == (x*sin(x), cos(y)) + + assert (x*sin(x)*cos(y)).as_independent(x, y) == (1, x*sin(x)*cos(y)) + + assert (sin(x)).as_independent(x) == (1, sin(x)) + assert (sin(x)).as_independent(y) == (sin(x), 1) + + assert (2*sin(x)).as_independent(x) == (2, sin(x)) + assert (2*sin(x)).as_independent(y) == (2*sin(x), 1) + + # issue 4903 = 1766b + n1, n2, n3 = symbols('n1 n2 n3', commutative=False) + assert (n1 + n1*n2).as_independent(n2) == (n1, n1*n2) + assert (n2*n1 + n1*n2).as_independent(n2) == (0, n1*n2 + n2*n1) + assert (n1*n2*n1).as_independent(n2) == (n1, n2*n1) + assert (n1*n2*n1).as_independent(n1) == (1, n1*n2*n1) + + assert (3*x).as_independent(x, as_Add=True) == (0, 3*x) + assert (3*x).as_independent(x, as_Add=False) == (3, x) + assert (3 + x).as_independent(x, as_Add=True) == (3, x) + assert (3 + x).as_independent(x, as_Add=False) == (1, 3 + x) + + # issue 5479 + assert (3*x).as_independent(Symbol) == (3, x) + + # issue 5648 + assert (n1*x*y).as_independent(x) == (n1*y, x) + assert ((x + n1)*(x - y)).as_independent(x) == (1, (x + n1)*(x - y)) + assert ((x + n1)*(x - y)).as_independent(y) == (x + n1, x - y) + assert (DiracDelta(x - n1)*DiracDelta(x - y)).as_independent(x) \ + == (1, DiracDelta(x - n1)*DiracDelta(x - y)) + assert (x*y*n1*n2*n3).as_independent(n2) == (x*y*n1, n2*n3) + assert (x*y*n1*n2*n3).as_independent(n1) == (x*y, n1*n2*n3) + assert (x*y*n1*n2*n3).as_independent(n3) == (x*y*n1*n2, n3) + assert (DiracDelta(x - n1)*DiracDelta(y - n1)*DiracDelta(x - n2)).as_independent(y) == \ + (DiracDelta(x - n1)*DiracDelta(x - n2), DiracDelta(y - n1)) + + # issue 5784 + assert (x + Integral(x, (x, 1, 2))).as_independent(x, strict=True) == \ + (Integral(x, (x, 1, 2)), x) + + eq = Add(x, -x, 2, -3, evaluate=False) + assert eq.as_independent(x) == (-1, Add(x, -x, evaluate=False)) + eq = Mul(x, 1/x, 2, -3, evaluate=False) + assert eq.as_independent(x) == (-6, Mul(x, 1/x, evaluate=False)) + + assert (x*y).as_independent(z, as_Add=True) == (x*y, 0) + +@XFAIL +def test_call_2(): + # TODO UndefinedFunction does not subclass Expr + assert (2*f)(x) == 2*f(x) + + +def test_replace(): + e = log(sin(x)) + tan(sin(x**2)) + + assert e.replace(sin, cos) == log(cos(x)) + tan(cos(x**2)) + assert e.replace( + sin, lambda a: sin(2*a)) == log(sin(2*x)) + tan(sin(2*x**2)) + + a = Wild('a') + b = Wild('b') + + assert e.replace(sin(a), cos(a)) == log(cos(x)) + tan(cos(x**2)) + assert e.replace( + sin(a), lambda a: sin(2*a)) == log(sin(2*x)) + tan(sin(2*x**2)) + # test exact + assert (2*x).replace(a*x + b, b - a, exact=True) == 2*x + assert (2*x).replace(a*x + b, b - a) == 2*x + assert (2*x).replace(a*x + b, b - a, exact=False) == 2/x + assert (2*x).replace(a*x + b, lambda a, b: b - a, exact=True) == 2*x + assert (2*x).replace(a*x + b, lambda a, b: b - a) == 2*x + assert (2*x).replace(a*x + b, lambda a, b: b - a, exact=False) == 2/x + + g = 2*sin(x**3) + + assert g.replace( + lambda expr: expr.is_Number, lambda expr: expr**2) == 4*sin(x**9) + + assert cos(x).replace(cos, sin, map=True) == (sin(x), {cos(x): sin(x)}) + assert sin(x).replace(cos, sin) == sin(x) + + cond, func = lambda x: x.is_Mul, lambda x: 2*x + assert (x*y).replace(cond, func, map=True) == (2*x*y, {x*y: 2*x*y}) + assert (x*(1 + x*y)).replace(cond, func, map=True) == \ + (2*x*(2*x*y + 1), {x*(2*x*y + 1): 2*x*(2*x*y + 1), x*y: 2*x*y}) + assert (y*sin(x)).replace(sin, lambda expr: sin(expr)/y, map=True) == \ + (sin(x), {sin(x): sin(x)/y}) + # if not simultaneous then y*sin(x) -> y*sin(x)/y = sin(x) -> sin(x)/y + assert (y*sin(x)).replace(sin, lambda expr: sin(expr)/y, + simultaneous=False) == sin(x)/y + assert (x**2 + O(x**3)).replace(Pow, lambda b, e: b**e/e + ) == x**2/2 + O(x**3) + assert (x**2 + O(x**3)).replace(Pow, lambda b, e: b**e/e, + simultaneous=False) == x**2/2 + O(x**3) + assert (x*(x*y + 3)).replace(lambda x: x.is_Mul, lambda x: 2 + x) == \ + x*(x*y + 5) + 2 + e = (x*y + 1)*(2*x*y + 1) + 1 + assert e.replace(cond, func, map=True) == ( + 2*((2*x*y + 1)*(4*x*y + 1)) + 1, + {2*x*y: 4*x*y, x*y: 2*x*y, (2*x*y + 1)*(4*x*y + 1): + 2*((2*x*y + 1)*(4*x*y + 1))}) + assert x.replace(x, y) == y + assert (x + 1).replace(1, 2) == x + 2 + + # https://groups.google.com/forum/#!topic/sympy/8wCgeC95tz0 + n1, n2, n3 = symbols('n1:4', commutative=False) + assert (n1*f(n2)).replace(f, lambda x: x) == n1*n2 + assert (n3*f(n2)).replace(f, lambda x: x) == n3*n2 + + # issue 16725 + assert S.Zero.replace(Wild('x'), 1) == 1 + # let the user override the default decision of False + assert S.Zero.replace(Wild('x'), 1, exact=True) == 0 + + +def test_replace_integral(): + # https://github.com/sympy/sympy/issues/27142 + q, p, s, t = symbols('q p s t', cls=Wild) + a, b, c, d = symbols('a b c d') + i = Integral(a + b, (b, c, d)) + pattern = Integral(q, (p, s, t)) + assert i.replace(pattern, q) == a + b + + +def test_find(): + expr = (x + y + 2 + sin(3*x)) + + assert expr.find(lambda u: u.is_Integer) == {S(2), S(3)} + assert expr.find(lambda u: u.is_Symbol) == {x, y} + + assert expr.find(lambda u: u.is_Integer, group=True) == {S(2): 1, S(3): 1} + assert expr.find(lambda u: u.is_Symbol, group=True) == {x: 2, y: 1} + + assert expr.find(Integer) == {S(2), S(3)} + assert expr.find(Symbol) == {x, y} + + assert expr.find(Integer, group=True) == {S(2): 1, S(3): 1} + assert expr.find(Symbol, group=True) == {x: 2, y: 1} + + a = Wild('a') + + expr = sin(sin(x)) + sin(x) + cos(x) + x + + assert expr.find(lambda u: type(u) is sin) == {sin(x), sin(sin(x))} + assert expr.find( + lambda u: type(u) is sin, group=True) == {sin(x): 2, sin(sin(x)): 1} + + assert expr.find(sin(a)) == {sin(x), sin(sin(x))} + assert expr.find(sin(a), group=True) == {sin(x): 2, sin(sin(x)): 1} + + assert expr.find(sin) == {sin(x), sin(sin(x))} + assert expr.find(sin, group=True) == {sin(x): 2, sin(sin(x)): 1} + + +def test_count(): + expr = (x + y + 2 + sin(3*x)) + + assert expr.count(lambda u: u.is_Integer) == 2 + assert expr.count(lambda u: u.is_Symbol) == 3 + + assert expr.count(Integer) == 2 + assert expr.count(Symbol) == 3 + assert expr.count(2) == 1 + + a = Wild('a') + + assert expr.count(sin) == 1 + assert expr.count(sin(a)) == 1 + assert expr.count(lambda u: type(u) is sin) == 1 + + assert f(x).count(f(x)) == 1 + assert f(x).diff(x).count(f(x)) == 1 + assert f(x).diff(x).count(x) == 2 + + +def test_has_basics(): + p = Wild('p') + + assert sin(x).has(x) + assert sin(x).has(sin) + assert not sin(x).has(y) + assert not sin(x).has(cos) + assert f(x).has(x) + assert f(x).has(f) + assert not f(x).has(y) + assert not f(x).has(g) + + assert f(x).diff(x).has(x) + assert f(x).diff(x).has(f) + assert f(x).diff(x).has(Derivative) + assert not f(x).diff(x).has(y) + assert not f(x).diff(x).has(g) + assert not f(x).diff(x).has(sin) + + assert (x**2).has(Symbol) + assert not (x**2).has(Wild) + assert (2*p).has(Wild) + + assert not x.has() + + # see issue at https://github.com/sympy/sympy/issues/5190 + assert not S(1).has(Wild) + assert not x.has(Wild) + + +def test_has_multiple(): + f = x**2*y + sin(2**t + log(z)) + + assert f.has(x) + assert f.has(y) + assert f.has(z) + assert f.has(t) + + assert not f.has(u) + + assert f.has(x, y, z, t) + assert f.has(x, y, z, t, u) + + i = Integer(4400) + + assert not i.has(x) + + assert (i*x**i).has(x) + assert not (i*y**i).has(x) + assert (i*y**i).has(x, y) + assert not (i*y**i).has(x, z) + + +def test_has_piecewise(): + f = (x*y + 3/y)**(3 + 2) + p = Piecewise((g(x), x < -1), (1, x <= 1), (f, True)) + + assert p.has(x) + assert p.has(y) + assert not p.has(z) + assert p.has(1) + assert p.has(3) + assert not p.has(4) + assert p.has(f) + assert p.has(g) + assert not p.has(h) + + +def test_has_iterative(): + A, B, C = symbols('A,B,C', commutative=False) + f = x*gamma(x)*sin(x)*exp(x*y)*A*B*C*cos(x*A*B) + + assert f.has(x) + assert f.has(x*y) + assert f.has(x*sin(x)) + assert not f.has(x*sin(y)) + assert f.has(x*A) + assert f.has(x*A*B) + assert not f.has(x*A*C) + assert f.has(x*A*B*C) + assert not f.has(x*A*C*B) + assert f.has(x*sin(x)*A*B*C) + assert not f.has(x*sin(x)*A*C*B) + assert not f.has(x*sin(y)*A*B*C) + assert f.has(x*gamma(x)) + assert not f.has(x + sin(x)) + + assert (x & y & z).has(x & z) + + +def test_has_integrals(): + f = Integral(x**2 + sin(x*y*z), (x, 0, x + y + z)) + + assert f.has(x + y) + assert f.has(x + z) + assert f.has(y + z) + + assert f.has(x*y) + assert f.has(x*z) + assert f.has(y*z) + + assert not f.has(2*x + y) + assert not f.has(2*x*y) + + +def test_has_tuple(): + assert Tuple(x, y).has(x) + assert not Tuple(x, y).has(z) + assert Tuple(f(x), g(x)).has(x) + assert not Tuple(f(x), g(x)).has(y) + assert Tuple(f(x), g(x)).has(f) + assert Tuple(f(x), g(x)).has(f(x)) + # XXX to be deprecated + #assert not Tuple(f, g).has(x) + #assert Tuple(f, g).has(f) + #assert not Tuple(f, g).has(h) + assert Tuple(True).has(True) + assert Tuple(True).has(S.true) + assert not Tuple(True).has(1) + + +def test_has_units(): + from sympy.physics.units import m, s + + assert (x*m/s).has(x) + assert (x*m/s).has(y, z) is False + + +def test_has_polys(): + poly = Poly(x**2 + x*y*sin(z), x, y, t) + + assert poly.has(x) + assert poly.has(x, y, z) + assert poly.has(x, y, z, t) + + +def test_has_physics(): + assert FockState((x, y)).has(x) + + +def test_as_poly_as_expr(): + f = x**2 + 2*x*y + + assert f.as_poly().as_expr() == f + assert f.as_poly(x, y).as_expr() == f + + assert (f + sin(x)).as_poly(x, y) is None + + p = Poly(f, x, y) + + assert p.as_poly() == p + + # https://github.com/sympy/sympy/issues/20610 + assert S(2).as_poly() is None + assert sqrt(2).as_poly(extension=True) is None + + raises(AttributeError, lambda: Tuple(x, x).as_poly(x)) + raises(AttributeError, lambda: Tuple(x ** 2, x, y).as_poly(x)) + + +def test_nonzero(): + assert bool(S.Zero) is False + assert bool(S.One) is True + assert bool(x) is True + assert bool(x + y) is True + assert bool(x - x) is False + assert bool(x*y) is True + assert bool(x*1) is True + assert bool(x*0) is False + + +def test_is_number(): + assert Float(3.14).is_number is True + assert Integer(737).is_number is True + assert Rational(3, 2).is_number is True + assert Rational(8).is_number is True + assert x.is_number is False + assert (2*x).is_number is False + assert (x + y).is_number is False + assert log(2).is_number is True + assert log(x).is_number is False + assert (2 + log(2)).is_number is True + assert (8 + log(2)).is_number is True + assert (2 + log(x)).is_number is False + assert (8 + log(2) + x).is_number is False + assert (1 + x**2/x - x).is_number is True + assert Tuple(Integer(1)).is_number is False + assert Add(2, x).is_number is False + assert Mul(3, 4).is_number is True + assert Pow(log(2), 2).is_number is True + assert oo.is_number is True + g = WildFunction('g') + assert g.is_number is False + assert (2*g).is_number is False + assert (x**2).subs(x, 3).is_number is True + + # test extensibility of .is_number + # on subinstances of Basic + class A(Basic): + pass + a = A() + assert a.is_number is False + + +def test_as_coeff_add(): + assert S(2).as_coeff_add() == (2, ()) + assert S(3.0).as_coeff_add() == (0, (S(3.0),)) + assert S(-3.0).as_coeff_add() == (0, (S(-3.0),)) + assert x.as_coeff_add() == (0, (x,)) + assert (x - 1).as_coeff_add() == (-1, (x,)) + assert (x + 1).as_coeff_add() == (1, (x,)) + assert (x + 2).as_coeff_add() == (2, (x,)) + assert (x + y).as_coeff_add(y) == (x, (y,)) + assert (3*x).as_coeff_add(y) == (3*x, ()) + # don't do expansion + e = (x + y)**2 + assert e.as_coeff_add(y) == (0, (e,)) + + +def test_as_coeff_mul(): + assert S(2).as_coeff_mul() == (2, ()) + assert S(3.0).as_coeff_mul() == (1, (S(3.0),)) + assert S(-3.0).as_coeff_mul() == (-1, (S(3.0),)) + assert S(-3.0).as_coeff_mul(rational=False) == (-S(3.0), ()) + assert x.as_coeff_mul() == (1, (x,)) + assert (-x).as_coeff_mul() == (-1, (x,)) + assert (2*x).as_coeff_mul() == (2, (x,)) + assert (x*y).as_coeff_mul(y) == (x, (y,)) + assert (3 + x).as_coeff_mul() == (1, (3 + x,)) + assert (3 + x).as_coeff_mul(y) == (3 + x, ()) + # don't do expansion + e = exp(x + y) + assert e.as_coeff_mul(y) == (1, (e,)) + e = 2**(x + y) + assert e.as_coeff_mul(y) == (1, (e,)) + assert (1.1*x).as_coeff_mul(rational=False) == (1.1, (x,)) + assert (1.1*x).as_coeff_mul() == (1, (1.1, x)) + assert (-oo*x).as_coeff_mul(rational=True) == (-1, (oo, x)) + + +def test_as_coeff_exponent(): + assert (3*x**4).as_coeff_exponent(x) == (3, 4) + assert (2*x**3).as_coeff_exponent(x) == (2, 3) + assert (4*x**2).as_coeff_exponent(x) == (4, 2) + assert (6*x**1).as_coeff_exponent(x) == (6, 1) + assert (3*x**0).as_coeff_exponent(x) == (3, 0) + assert (2*x**0).as_coeff_exponent(x) == (2, 0) + assert (1*x**0).as_coeff_exponent(x) == (1, 0) + assert (0*x**0).as_coeff_exponent(x) == (0, 0) + assert (-1*x**0).as_coeff_exponent(x) == (-1, 0) + assert (-2*x**0).as_coeff_exponent(x) == (-2, 0) + assert (2*x**3 + pi*x**3).as_coeff_exponent(x) == (2 + pi, 3) + assert (x*log(2)/(2*x + pi*x)).as_coeff_exponent(x) == \ + (log(2)/(2 + pi), 0) + # issue 4784 + D = Derivative + fx = D(f(x), x) + assert fx.as_coeff_exponent(f(x)) == (fx, 0) + + +def test_extractions(): + for base in (2, S.Exp1): + assert Pow(base**x, 3, evaluate=False + ).extract_multiplicatively(base**x) == base**(2*x) + assert (base**(5*x)).extract_multiplicatively( + base**(3*x)) == base**(2*x) + assert ((x*y)**3).extract_multiplicatively(x**2 * y) == x*y**2 + assert ((x*y)**3).extract_multiplicatively(x**4 * y) is None + assert (2*x).extract_multiplicatively(2) == x + assert (2*x).extract_multiplicatively(3) is None + assert (2*x).extract_multiplicatively(-1) is None + assert (S.Half*x).extract_multiplicatively(3) == x/6 + assert (sqrt(x)).extract_multiplicatively(x) is None + assert (sqrt(x)).extract_multiplicatively(1/x) is None + assert x.extract_multiplicatively(-x) is None + assert (-2 - 4*I).extract_multiplicatively(-2) == 1 + 2*I + assert (-2 - 4*I).extract_multiplicatively(3) is None + assert (-2*x - 4*y - 8).extract_multiplicatively(-2) == x + 2*y + 4 + assert (-2*x*y - 4*x**2*y).extract_multiplicatively(-2*y) == 2*x**2 + x + assert (2*x*y + 4*x**2*y).extract_multiplicatively(2*y) == 2*x**2 + x + assert (-4*y**2*x).extract_multiplicatively(-3*y) is None + assert (2*x).extract_multiplicatively(1) == 2*x + assert (-oo).extract_multiplicatively(5) is -oo + assert (oo).extract_multiplicatively(5) is oo + + assert ((x*y)**3).extract_additively(1) is None + assert (x + 1).extract_additively(x) == 1 + assert (x + 1).extract_additively(2*x) is None + assert (x + 1).extract_additively(-x) is None + assert (-x + 1).extract_additively(2*x) is None + assert (2*x + 3).extract_additively(x) == x + 3 + assert (2*x + 3).extract_additively(2) == 2*x + 1 + assert (2*x + 3).extract_additively(3) == 2*x + assert (2*x + 3).extract_additively(-2) is None + assert (2*x + 3).extract_additively(3*x) is None + assert (2*x + 3).extract_additively(2*x) == 3 + assert x.extract_additively(0) == x + assert S(2).extract_additively(x) is None + assert S(2.).extract_additively(2.) is S.Zero + assert S(2.).extract_additively(2) is S.Zero + assert S(2*x + 3).extract_additively(x + 1) == x + 2 + assert S(2*x + 3).extract_additively(y + 1) is None + assert S(2*x - 3).extract_additively(x + 1) is None + assert S(2*x - 3).extract_additively(y + z) is None + assert ((a + 1)*x*4 + y).extract_additively(x).expand() == \ + 4*a*x + 3*x + y + assert ((a + 1)*x*4 + 3*y).extract_additively(x + 2*y).expand() == \ + 4*a*x + 3*x + y + assert (y*(x + 1)).extract_additively(x + 1) is None + assert ((y + 1)*(x + 1) + 3).extract_additively(x + 1) == \ + y*(x + 1) + 3 + assert ((x + y)*(x + 1) + x + y + 3).extract_additively(x + y) == \ + x*(x + y) + 3 + assert (x + y + 2*((x + y)*(x + 1)) + 3).extract_additively((x + y)*(x + 1)) == \ + x + y + (x + 1)*(x + y) + 3 + assert ((y + 1)*(x + 2*y + 1) + 3).extract_additively(y + 1) == \ + (x + 2*y)*(y + 1) + 3 + assert (-x - x*I).extract_additively(-x) == -I*x + # extraction does not leave artificats, now + assert (4*x*(y + 1) + y).extract_additively(x) == x*(4*y + 3) + y + + n = Symbol("n", integer=True) + assert (Integer(-3)).could_extract_minus_sign() is True + assert (-n*x + x).could_extract_minus_sign() != \ + (n*x - x).could_extract_minus_sign() + assert (x - y).could_extract_minus_sign() != \ + (-x + y).could_extract_minus_sign() + assert (1 - x - y).could_extract_minus_sign() is True + assert (1 - x + y).could_extract_minus_sign() is False + assert ((-x - x*y)/y).could_extract_minus_sign() is False + assert ((x + x*y)/(-y)).could_extract_minus_sign() is True + assert ((x + x*y)/y).could_extract_minus_sign() is False + assert ((-x - y)/(x + y)).could_extract_minus_sign() is False + + class sign_invariant(Function, Expr): + nargs = 1 + def __neg__(self): + return self + foo = sign_invariant(x) + assert foo == -foo + assert foo.could_extract_minus_sign() is False + assert (x - y).could_extract_minus_sign() is False + assert (-x + y).could_extract_minus_sign() is True + assert (x - 1).could_extract_minus_sign() is False + assert (1 - x).could_extract_minus_sign() is True + assert (sqrt(2) - 1).could_extract_minus_sign() is True + assert (1 - sqrt(2)).could_extract_minus_sign() is False + # check that result is canonical + eq = (3*x + 15*y).extract_multiplicatively(3) + assert eq.args == eq.func(*eq.args).args + + +def test_nan_extractions(): + for r in (1, 0, I, nan): + assert nan.extract_additively(r) is None + assert nan.extract_multiplicatively(r) is None + + +def test_coeff(): + assert (x + 1).coeff(x + 1) == 1 + assert (3*x).coeff(0) == 0 + assert (z*(1 + x)*x**2).coeff(1 + x) == z*x**2 + assert (1 + 2*x*x**(1 + x)).coeff(x*x**(1 + x)) == 2 + assert (1 + 2*x**(y + z)).coeff(x**(y + z)) == 2 + assert (3 + 2*x + 4*x**2).coeff(1) == 0 + assert (3 + 2*x + 4*x**2).coeff(-1) == 0 + assert (3 + 2*x + 4*x**2).coeff(x) == 2 + assert (3 + 2*x + 4*x**2).coeff(x**2) == 4 + assert (3 + 2*x + 4*x**2).coeff(x**3) == 0 + + assert (-x/8 + x*y).coeff(x) == Rational(-1, 8) + y + assert (-x/8 + x*y).coeff(-x) == S.One/8 + assert (4*x).coeff(2*x) == 0 + assert (2*x).coeff(2*x) == 1 + assert (-oo*x).coeff(x*oo) == -1 + assert (10*x).coeff(x, 0) == 0 + assert (10*x).coeff(10*x, 0) == 0 + + n1, n2 = symbols('n1 n2', commutative=False) + assert (n1*n2).coeff(n1) == 1 + assert (n1*n2).coeff(n2) == n1 + assert (n1*n2 + x*n1).coeff(n1) == 1 # 1*n1*(n2+x) + assert (n2*n1 + x*n1).coeff(n1) == n2 + x + assert (n2*n1 + x*n1**2).coeff(n1) == n2 + assert (n1**x).coeff(n1) == 0 + assert (n1*n2 + n2*n1).coeff(n1) == 0 + assert (2*(n1 + n2)*n2).coeff(n1 + n2, right=1) == n2 + assert (2*(n1 + n2)*n2).coeff(n1 + n2, right=0) == 2 + + assert (2*f(x) + 3*f(x).diff(x)).coeff(f(x)) == 2 + + expr = z*(x + y)**2 + expr2 = z*(x + y)**2 + z*(2*x + 2*y)**2 + assert expr.coeff(z) == (x + y)**2 + assert expr.coeff(x + y) == 0 + assert expr2.coeff(z) == (x + y)**2 + (2*x + 2*y)**2 + + assert (x + y + 3*z).coeff(1) == x + y + assert (-x + 2*y).coeff(-1) == x + assert (x - 2*y).coeff(-1) == 2*y + assert (3 + 2*x + 4*x**2).coeff(1) == 0 + assert (-x - 2*y).coeff(2) == -y + assert (x + sqrt(2)*x).coeff(sqrt(2)) == x + assert (3 + 2*x + 4*x**2).coeff(x) == 2 + assert (3 + 2*x + 4*x**2).coeff(x**2) == 4 + assert (3 + 2*x + 4*x**2).coeff(x**3) == 0 + assert (z*(x + y)**2).coeff((x + y)**2) == z + assert (z*(x + y)**2).coeff(x + y) == 0 + assert (2 + 2*x + (x + 1)*y).coeff(x + 1) == y + + assert (x + 2*y + 3).coeff(1) == x + assert (x + 2*y + 3).coeff(x, 0) == 2*y + 3 + assert (x**2 + 2*y + 3*x).coeff(x**2, 0) == 2*y + 3*x + assert x.coeff(0, 0) == 0 + assert x.coeff(x, 0) == 0 + + n, m, o, l = symbols('n m o l', commutative=False) + assert n.coeff(n) == 1 + assert y.coeff(n) == 0 + assert (3*n).coeff(n) == 3 + assert (2 + n).coeff(x*m) == 0 + assert (2*x*n*m).coeff(x) == 2*n*m + assert (2 + n).coeff(x*m*n + y) == 0 + assert (2*x*n*m).coeff(3*n) == 0 + assert (n*m + m*n*m).coeff(n) == 1 + m + assert (n*m + m*n*m).coeff(n, right=True) == m # = (1 + m)*n*m + assert (n*m + m*n).coeff(n) == 0 + assert (n*m + o*m*n).coeff(m*n) == o + assert (n*m + o*m*n).coeff(m*n, right=True) == 1 + assert (n*m + n*m*n).coeff(n*m, right=True) == 1 + n # = n*m*(n + 1) + + assert (x*y).coeff(z, 0) == x*y + + assert (x*n + y*n + z*m).coeff(n) == x + y + assert (n*m + n*o + o*l).coeff(n, right=True) == m + o + assert (x*n*m*n + y*n*m*o + z*l).coeff(m, right=True) == x*n + y*o + assert (x*n*m*n + x*n*m*o + z*l).coeff(m, right=True) == n + o + assert (x*n*m*n + x*n*m*o + z*l).coeff(m) == x*n + + +def test_coeff2(): + r, kappa = symbols('r, kappa') + psi = Function("psi") + g = 1/r**2 * (2*r*psi(r).diff(r, 1) + r**2 * psi(r).diff(r, 2)) + g = g.expand() + assert g.coeff(psi(r).diff(r)) == 2/r + + +def test_coeff2_0(): + r, kappa = symbols('r, kappa') + psi = Function("psi") + g = 1/r**2 * (2*r*psi(r).diff(r, 1) + r**2 * psi(r).diff(r, 2)) + g = g.expand() + + assert g.coeff(psi(r).diff(r, 2)) == 1 + + +def test_coeff_expand(): + expr = z*(x + y)**2 + expr2 = z*(x + y)**2 + z*(2*x + 2*y)**2 + assert expr.coeff(z) == (x + y)**2 + assert expr2.coeff(z) == (x + y)**2 + (2*x + 2*y)**2 + + +def test_integrate(): + assert x.integrate(x) == x**2/2 + assert x.integrate((x, 0, 1)) == S.Half + + +def test_as_base_exp(): + assert x.as_base_exp() == (x, S.One) + assert (x*y*z).as_base_exp() == (x*y*z, S.One) + assert (x + y + z).as_base_exp() == (x + y + z, S.One) + assert ((x + y)**z).as_base_exp() == (x + y, z) + assert (x**2*y**2).as_base_exp() == (x*y, 2) + assert (x**z*y**z).as_base_exp() == (x**z*y**z, S.One) + + +def test_issue_4963(): + assert hasattr(Mul(x, y), "is_commutative") + assert hasattr(Mul(x, y, evaluate=False), "is_commutative") + assert hasattr(Pow(x, y), "is_commutative") + assert hasattr(Pow(x, y, evaluate=False), "is_commutative") + expr = Mul(Pow(2, 2, evaluate=False), 3, evaluate=False) + 1 + assert hasattr(expr, "is_commutative") + + +def test_action_verbs(): + assert nsimplify(1/(exp(3*pi*x/5) + 1)) == \ + (1/(exp(3*pi*x/5) + 1)).nsimplify() + assert ratsimp(1/x + 1/y) == (1/x + 1/y).ratsimp() + assert trigsimp(log(x), deep=True) == (log(x)).trigsimp(deep=True) + assert radsimp(1/(2 + sqrt(2))) == (1/(2 + sqrt(2))).radsimp() + assert radsimp(1/(a + b*sqrt(c)), symbolic=False) == \ + (1/(a + b*sqrt(c))).radsimp(symbolic=False) + assert powsimp(x**y*x**z*y**z, combine='all') == \ + (x**y*x**z*y**z).powsimp(combine='all') + assert (x**t*y**t).powsimp(force=True) == (x*y)**t + assert simplify(x**y*x**z*y**z) == (x**y*x**z*y**z).simplify() + assert together(1/x + 1/y) == (1/x + 1/y).together() + assert collect(a*x**2 + b*x**2 + a*x - b*x + c, x) == \ + (a*x**2 + b*x**2 + a*x - b*x + c).collect(x) + assert apart(y/(y + 2)/(y + 1), y) == (y/(y + 2)/(y + 1)).apart(y) + assert combsimp(y/(x + 2)/(x + 1)) == (y/(x + 2)/(x + 1)).combsimp() + assert gammasimp(gamma(x)/gamma(x-5)) == (gamma(x)/gamma(x-5)).gammasimp() + assert factor(x**2 + 5*x + 6) == (x**2 + 5*x + 6).factor() + assert refine(sqrt(x**2)) == sqrt(x**2).refine() + assert cancel((x**2 + 5*x + 6)/(x + 2)) == ((x**2 + 5*x + 6)/(x + 2)).cancel() + + +def test_as_powers_dict(): + assert x.as_powers_dict() == {x: 1} + assert (x**y*z).as_powers_dict() == {x: y, z: 1} + assert Mul(2, 2, evaluate=False).as_powers_dict() == {S(2): S(2)} + assert (x*y).as_powers_dict()[z] == 0 + assert (x + y).as_powers_dict()[z] == 0 + + +def test_as_coefficients_dict(): + check = [S.One, x, y, x*y, 1] + assert [Add(3*x, 2*x, y, 3).as_coefficients_dict()[i] for i in check] == \ + [3, 5, 1, 0, 3] + assert [Add(3*x, 2*x, y, 3, evaluate=False).as_coefficients_dict()[i] + for i in check] == [3, 5, 1, 0, 3] + assert [(3*x*y).as_coefficients_dict()[i] for i in check] == \ + [0, 0, 0, 3, 0] + assert [(3.0*x*y).as_coefficients_dict()[i] for i in check] == \ + [0, 0, 0, 3.0, 0] + assert (3.0*x*y).as_coefficients_dict()[3.0*x*y] == 0 + eq = x*(x + 1)*a + x*b + c/x + assert eq.as_coefficients_dict(x) == {x: b, 1/x: c, + x*(x + 1): a} + assert eq.expand().as_coefficients_dict(x) == {x**2: a, x: a + b, 1/x: c} + assert x.as_coefficients_dict() == {x: S.One} + + +def test_args_cnc(): + A = symbols('A', commutative=False) + assert (x + A).args_cnc() == \ + [[], [x + A]] + assert (x + a).args_cnc() == \ + [[a + x], []] + assert (x*a).args_cnc() == \ + [[a, x], []] + assert (x*y*A*(A + 1)).args_cnc(cset=True) == \ + [{x, y}, [A, 1 + A]] + assert Mul(x, x, evaluate=False).args_cnc(cset=True, warn=False) == \ + [{x}, []] + assert Mul(x, x**2, evaluate=False).args_cnc(cset=True, warn=False) == \ + [{x, x**2}, []] + raises(ValueError, lambda: Mul(x, x, evaluate=False).args_cnc(cset=True)) + assert Mul(x, y, x, evaluate=False).args_cnc() == \ + [[x, y, x], []] + # always split -1 from leading number + assert (-1.*x).args_cnc() == [[-1, 1.0, x], []] + + +def test_new_rawargs(): + n = Symbol('n', commutative=False) + a = x + n + assert a.is_commutative is False + assert a._new_rawargs(x).is_commutative + assert a._new_rawargs(x, y).is_commutative + assert a._new_rawargs(x, n).is_commutative is False + assert a._new_rawargs(x, y, n).is_commutative is False + m = x*n + assert m.is_commutative is False + assert m._new_rawargs(x).is_commutative + assert m._new_rawargs(n).is_commutative is False + assert m._new_rawargs(x, y).is_commutative + assert m._new_rawargs(x, n).is_commutative is False + assert m._new_rawargs(x, y, n).is_commutative is False + + assert m._new_rawargs(x, n, reeval=False).is_commutative is False + assert m._new_rawargs(S.One) is S.One + + +def test_issue_5226(): + assert Add(evaluate=False) == 0 + assert Mul(evaluate=False) == 1 + assert Mul(x + y, evaluate=False).is_Add + + +def test_free_symbols(): + # free_symbols should return the free symbols of an object + assert S.One.free_symbols == set() + assert x.free_symbols == {x} + assert Integral(x, (x, 1, y)).free_symbols == {y} + assert (-Integral(x, (x, 1, y))).free_symbols == {y} + assert meter.free_symbols == set() + assert (meter**x).free_symbols == {x} + + +def test_has_free(): + assert x.has_free(x) + assert not x.has_free(y) + assert (x + y).has_free(x) + assert (x + y).has_free(*(x, z)) + assert f(x).has_free(x) + assert f(x).has_free(f(x)) + assert Integral(f(x), (f(x), 1, y)).has_free(y) + assert not Integral(f(x), (f(x), 1, y)).has_free(x) + assert not Integral(f(x), (f(x), 1, y)).has_free(f(x)) + # simple extraction + assert (x + 1 + y).has_free(x + 1) + assert not (x + 2 + y).has_free(x + 1) + assert (2 + 3*x*y).has_free(3*x) + raises(TypeError, lambda: x.has_free({x, y})) + s = FiniteSet(1, 2) + assert Piecewise((s, x > 3), (4, True)).has_free(s) + assert not Piecewise((1, x > 3), (4, True)).has_free(s) + # can't make set of these, but fallback will handle + raises(TypeError, lambda: x.has_free(y, [])) + + +def test_has_xfree(): + assert (x + 1).has_xfree({x}) + assert ((x + 1)**2).has_xfree({x + 1}) + assert not (x + y + 1).has_xfree({x + 1}) + raises(TypeError, lambda: x.has_xfree(x)) + raises(TypeError, lambda: x.has_xfree([x])) + + +def test_issue_5300(): + x = Symbol('x', commutative=False) + assert x*sqrt(2)/sqrt(6) == x*sqrt(3)/3 + + +def test_floordiv(): + from sympy.functions.elementary.integers import floor + assert x // y == floor(x / y) + + +def test_as_coeff_Mul(): + assert Integer(3).as_coeff_Mul() == (Integer(3), Integer(1)) + assert Rational(3, 4).as_coeff_Mul() == (Rational(3, 4), Integer(1)) + assert Float(5.0).as_coeff_Mul() == (Float(5.0), Integer(1)) + assert Float(0.0).as_coeff_Mul() == (Float(0.0), Integer(1)) + + assert (Integer(3)*x).as_coeff_Mul() == (Integer(3), x) + assert (Rational(3, 4)*x).as_coeff_Mul() == (Rational(3, 4), x) + assert (Float(5.0)*x).as_coeff_Mul() == (Float(5.0), x) + + assert (Integer(3)*x*y).as_coeff_Mul() == (Integer(3), x*y) + assert (Rational(3, 4)*x*y).as_coeff_Mul() == (Rational(3, 4), x*y) + assert (Float(5.0)*x*y).as_coeff_Mul() == (Float(5.0), x*y) + + assert (x).as_coeff_Mul() == (S.One, x) + assert (x*y).as_coeff_Mul() == (S.One, x*y) + assert (-oo*x).as_coeff_Mul(rational=True) == (-1, oo*x) + + +def test_as_coeff_Add(): + assert Integer(3).as_coeff_Add() == (Integer(3), Integer(0)) + assert Rational(3, 4).as_coeff_Add() == (Rational(3, 4), Integer(0)) + assert Float(5.0).as_coeff_Add() == (Float(5.0), Integer(0)) + + assert (Integer(3) + x).as_coeff_Add() == (Integer(3), x) + assert (Rational(3, 4) + x).as_coeff_Add() == (Rational(3, 4), x) + assert (Float(5.0) + x).as_coeff_Add() == (Float(5.0), x) + assert (Float(5.0) + x).as_coeff_Add(rational=True) == (0, Float(5.0) + x) + + assert (Integer(3) + x + y).as_coeff_Add() == (Integer(3), x + y) + assert (Rational(3, 4) + x + y).as_coeff_Add() == (Rational(3, 4), x + y) + assert (Float(5.0) + x + y).as_coeff_Add() == (Float(5.0), x + y) + + assert (x).as_coeff_Add() == (S.Zero, x) + assert (x*y).as_coeff_Add() == (S.Zero, x*y) + + +def test_expr_sorting(): + + exprs = [1/x**2, 1/x, sqrt(sqrt(x)), sqrt(x), x, sqrt(x)**3, x**2] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [x, 2*x, 2*x**2, 2*x**3, x**n, 2*x**n, sin(x), sin(x)**n, + sin(x**2), cos(x), cos(x**2), tan(x)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [x + 1, x**2 + x + 1, x**3 + x**2 + x + 1] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [S(4), x - 3*I/2, x + 3*I/2, x - 4*I + 1, x + 4*I + 1] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [f(x), g(x), exp(x), sin(x), cos(x), factorial(x)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [Tuple(x, y), Tuple(x, z), Tuple(x, y, z)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[3], [1, 2]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[1, 2], [2, 3]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[1, 2], [1, 2, 3]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [{x: -y}, {x: y}] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [{1}, {1, 2}] + assert sorted(exprs, key=default_sort_key) == exprs + + a, b = exprs = [Dummy('x'), Dummy('x')] + assert sorted([b, a], key=default_sort_key) == exprs + + +def test_as_ordered_factors(): + + assert x.as_ordered_factors() == [x] + assert (2*x*x**n*sin(x)*cos(x)).as_ordered_factors() \ + == [Integer(2), x, x**n, sin(x), cos(x)] + + args = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + expr = Mul(*args) + + assert expr.as_ordered_factors() == args + + A, B = symbols('A,B', commutative=False) + + assert (A*B).as_ordered_factors() == [A, B] + assert (B*A).as_ordered_factors() == [B, A] + + +def test_as_ordered_terms(): + + assert x.as_ordered_terms() == [x] + assert (sin(x)**2*cos(x) + sin(x)*cos(x)**2 + 1).as_ordered_terms() \ + == [sin(x)**2*cos(x), sin(x)*cos(x)**2, 1] + + args = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + expr = Add(*args) + + assert expr.as_ordered_terms() == args + + assert (1 + 4*sqrt(3)*pi*x).as_ordered_terms() == [4*pi*x*sqrt(3), 1] + + assert ( 2 + 3*I).as_ordered_terms() == [2, 3*I] + assert (-2 + 3*I).as_ordered_terms() == [-2, 3*I] + assert ( 2 - 3*I).as_ordered_terms() == [2, -3*I] + assert (-2 - 3*I).as_ordered_terms() == [-2, -3*I] + + assert ( 4 + 3*I).as_ordered_terms() == [4, 3*I] + assert (-4 + 3*I).as_ordered_terms() == [-4, 3*I] + assert ( 4 - 3*I).as_ordered_terms() == [4, -3*I] + assert (-4 - 3*I).as_ordered_terms() == [-4, -3*I] + + e = x**2*y**2 + x*y**4 + y + 2 + + assert e.as_ordered_terms(order="lex") == [x**2*y**2, x*y**4, y, 2] + assert e.as_ordered_terms(order="grlex") == [x*y**4, x**2*y**2, y, 2] + assert e.as_ordered_terms(order="rev-lex") == [2, y, x*y**4, x**2*y**2] + assert e.as_ordered_terms(order="rev-grlex") == [2, y, x**2*y**2, x*y**4] + + k = symbols('k') + assert k.as_ordered_terms(data=True) == ([(k, ((1.0, 0.0), (1,), ()))], [k]) + + +def test_sort_key_atomic_expr(): + from sympy.physics.units import m, s + assert sorted([-m, s], key=lambda arg: arg.sort_key()) == [-m, s] + + +def test_eval_interval(): + assert exp(x)._eval_interval(*Tuple(x, 0, 1)) == exp(1) - exp(0) + + # issue 4199 + a = x/y + raises(NotImplementedError, lambda: a._eval_interval(x, S.Zero, oo)._eval_interval(y, oo, S.Zero)) + raises(NotImplementedError, lambda: a._eval_interval(x, S.Zero, oo)._eval_interval(y, S.Zero, oo)) + a = x - y + raises(NotImplementedError, lambda: a._eval_interval(x, S.One, oo)._eval_interval(y, oo, S.One)) + raises(ValueError, lambda: x._eval_interval(x, None, None)) + a = -y*Heaviside(x - y) + assert a._eval_interval(x, -oo, oo) == -y + assert a._eval_interval(x, oo, -oo) == y + + +def test_eval_interval_zoo(): + # Test that limit is used when zoo is returned + assert Si(1/x)._eval_interval(x, S.Zero, S.One) == -pi/2 + Si(1) + + +def test_primitive(): + assert (3*(x + 1)**2).primitive() == (3, (x + 1)**2) + assert (6*x + 2).primitive() == (2, 3*x + 1) + assert (x/2 + 3).primitive() == (S.Half, x + 6) + eq = (6*x + 2)*(x/2 + 3) + assert eq.primitive()[0] == 1 + eq = (2 + 2*x)**2 + assert eq.primitive()[0] == 1 + assert (4.0*x).primitive() == (1, 4.0*x) + assert (4.0*x + y/2).primitive() == (S.Half, 8.0*x + y) + assert (-2*x).primitive() == (2, -x) + assert Add(5*z/7, 0.5*x, 3*y/2, evaluate=False).primitive() == \ + (S.One/14, 7.0*x + 21*y + 10*z) + for i in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + assert (i + x/3).primitive() == \ + (S.One/3, i + x) + assert (S.Infinity + 2*x/3 + 4*y/7).primitive() == \ + (S.One/21, 14*x + 12*y + oo) + assert S.Zero.primitive() == (S.One, S.Zero) + + +def test_issue_5843(): + a = 1 + x + assert (2*a).extract_multiplicatively(a) == 2 + assert (4*a).extract_multiplicatively(2*a) == 2 + assert ((3*a)*(2*a)).extract_multiplicatively(a) == 6*a + + +def test_is_constant(): + from sympy.solvers.solvers import checksol + assert Sum(x, (x, 1, 10)).is_constant() is True + assert Sum(x, (x, 1, n)).is_constant() is False + assert Sum(x, (x, 1, n)).is_constant(y) is True + assert Sum(x, (x, 1, n)).is_constant(n) is False + assert Sum(x, (x, 1, n)).is_constant(x) is True + eq = a*cos(x)**2 + a*sin(x)**2 - a + assert eq.is_constant() is True + assert eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 + assert x.is_constant() is False + assert x.is_constant(y) is True + assert log(x/y).is_constant() is False + + assert checksol(x, x, Sum(x, (x, 1, n))) is False + assert checksol(x, x, Sum(x, (x, 1, n))) is False + assert f(1).is_constant + assert checksol(x, x, f(x)) is False + + assert Pow(x, S.Zero, evaluate=False).is_constant() is True # == 1 + assert Pow(S.Zero, x, evaluate=False).is_constant() is False # == 0 or 1 + assert (2**x).is_constant() is False + assert Pow(S(2), S(3), evaluate=False).is_constant() is True + + z1, z2 = symbols('z1 z2', zero=True) + assert (z1 + 2*z2).is_constant() is True + + assert meter.is_constant() is True + assert (3*meter).is_constant() is True + assert (x*meter).is_constant() is False + + +def test_equals(): + assert (-3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2).equals(0) + assert (x**2 - 1).equals((x + 1)*(x - 1)) + assert (cos(x)**2 + sin(x)**2).equals(1) + assert (a*cos(x)**2 + a*sin(x)**2).equals(a) + r = sqrt(2) + assert (-1/(r + r*x) + 1/r/(1 + x)).equals(0) + assert factorial(x + 1).equals((x + 1)*factorial(x)) + assert sqrt(3).equals(2*sqrt(3)) is False + assert (sqrt(5)*sqrt(3)).equals(sqrt(3)) is False + assert (sqrt(5) + sqrt(3)).equals(0) is False + assert (sqrt(5) + pi).equals(0) is False + assert meter.equals(0) is False + assert (3*meter**2).equals(0) is False + eq = -(-1)**(S(3)/4)*6**(S.One/4) + (-6)**(S.One/4)*I + if eq != 0: # if canonicalization makes this zero, skip the test + assert eq.equals(0) + assert sqrt(x).equals(0) is False + + # from integrate(x*sqrt(1 + 2*x), x); + # diff is zero only when assumptions allow + i = 2*sqrt(2)*x**(S(5)/2)*(1 + 1/(2*x))**(S(5)/2)/5 + \ + 2*sqrt(2)*x**(S(3)/2)*(1 + 1/(2*x))**(S(5)/2)/(-6 - 3/x) + ans = sqrt(2*x + 1)*(6*x**2 + x - 1)/15 + diff = i - ans + assert diff.equals(0) is None # should be False, but previously this was False due to wrong intermediate result + assert diff.subs(x, Rational(-1, 2)/2) == 7*sqrt(2)/120 + # there are regions for x for which the expression is True, for + # example, when x < -1/2 or x > 0 the expression is zero + p = Symbol('p', positive=True) + assert diff.subs(x, p).equals(0) is True + assert diff.subs(x, -1).equals(0) is True + + # prove via minimal_polynomial or self-consistency + eq = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert eq.equals(0) + q = 3**Rational(1, 3) + 3 + p = expand(q**3)**Rational(1, 3) + assert (p - q).equals(0) + + # issue 6829 + # eq = q*x + q/4 + x**4 + x**3 + 2*x**2 - S.One/3 + # z = eq.subs(x, solve(eq, x)[0]) + q = symbols('q') + z = (q*(-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12)/2 - sqrt((2*q - S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/6)/2 - S.One/4) + q/4 + (-sqrt(-2*(-(q + - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q + - S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**4 + (-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q - + S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**3 + 2*(-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q - + S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**2 - Rational(1, 3)) + assert z.equals(0) + + +def test_random(): + from sympy.functions.combinatorial.numbers import lucas + from sympy.simplify.simplify import posify + assert posify(x)[0]._random() is not None + assert lucas(n)._random(2, -2, 0, -1, 1) is None + + # issue 8662 + assert Piecewise((Max(x, y), z))._random() is None + + +def test_round(): + assert str(Float('0.1249999').round(2)) == '0.12' + d20 = 12345678901234567890 + ans = S(d20).round(2) + assert ans.is_Integer and ans == d20 + ans = S(d20).round(-2) + assert ans.is_Integer and ans == 12345678901234567900 + assert str(S('1/7').round(4)) == '0.1429' + assert str(S('.[12345]').round(4)) == '0.1235' + assert str(S('.1349').round(2)) == '0.13' + n = S(12345) + ans = n.round() + assert ans.is_Integer + assert ans == n + ans = n.round(1) + assert ans.is_Integer + assert ans == n + ans = n.round(4) + assert ans.is_Integer + assert ans == n + assert n.round(-1) == 12340 + + r = Float(str(n)).round(-4) + assert r == 10000.0 + + assert n.round(-5) == 0 + + assert str((pi + sqrt(2)).round(2)) == '4.56' + assert (10*(pi + sqrt(2))).round(-1) == 50.0 + raises(TypeError, lambda: round(x + 2, 2)) + assert str(S(2.3).round(1)) == '2.3' + # rounding in SymPy (as in Decimal) should be + # exact for the given precision; we check here + # that when a 5 follows the last digit that + # the rounded digit will be even. + for i in range(-99, 100): + # construct a decimal that ends in 5, e.g. 123 -> 0.1235 + s = str(abs(i)) + p = len(s) # we are going to round to the last digit of i + n = '0.%s5' % s # put a 5 after i's digits + j = p + 2 # 2 for '0.' + if i < 0: # 1 for '-' + j += 1 + n = '-' + n + v = str(Float(n).round(p))[:j] # pertinent digits + if v.endswith('.'): + continue # it ends with 0 which is even + L = int(v[-1]) # last digit + assert L % 2 == 0, (n, '->', v) + + assert (Float(.3, 3) + 2*pi).round() == 7 + assert (Float(.3, 3) + 2*pi*100).round() == 629 + assert (pi + 2*E*I).round() == 3 + 5*I + # don't let request for extra precision give more than + # what is known (in this case, only 3 digits) + assert str((Float(.03, 3) + 2*pi/100).round(5)) == '0.0928' + assert str((Float(.03, 3) + 2*pi/100).round(4)) == '0.0928' + + assert S.Zero.round() == 0 + + a = (Add(1, Float('1.' + '9'*27, ''), evaluate=False)) + assert a.round(10) == Float('3.000000000000000000000000000', '') + assert a.round(25) == Float('3.000000000000000000000000000', '') + assert a.round(26) == Float('3.000000000000000000000000000', '') + assert a.round(27) == Float('2.999999999999999999999999999', '') + assert a.round(30) == Float('2.999999999999999999999999999', '') + #assert a.round(10) == Float('3.0000000000', '') + #assert a.round(25) == Float('3.0000000000000000000000000', '') + #assert a.round(26) == Float('3.00000000000000000000000000', '') + #assert a.round(27) == Float('2.999999999999999999999999999', '') + #assert a.round(30) == Float('2.999999999999999999999999999', '') + + # XXX: Should round set the precision of the result? + # The previous version of the tests above is this but they only pass + # because Floats with unequal precision compare equal: + # + # assert a.round(10) == Float('3.0000000000', '') + # assert a.round(25) == Float('3.0000000000000000000000000', '') + # assert a.round(26) == Float('3.00000000000000000000000000', '') + # assert a.round(27) == Float('2.999999999999999999999999999', '') + # assert a.round(30) == Float('2.999999999999999999999999999', '') + + raises(TypeError, lambda: x.round()) + raises(TypeError, lambda: f(1).round()) + + # exact magnitude of 10 + assert str(S.One.round()) == '1' + assert str(S(100).round()) == '100' + + # applied to real and imaginary portions + assert (2*pi + E*I).round() == 6 + 3*I + assert (2*pi + I/10).round() == 6 + assert (pi/10 + 2*I).round() == 2*I + # the lhs re and im parts are Float with dps of 2 + # and those on the right have dps of 15 so they won't compare + # equal unless we use string or compare components (which will + # then coerce the floats to the same precision) or re-create + # the floats + assert str((pi/10 + E*I).round(2)) == '0.31 + 2.72*I' + assert str((pi/10 + E*I).round(2).as_real_imag()) == '(0.31, 2.72)' + assert str((pi/10 + E*I).round(2)) == '0.31 + 2.72*I' + + # issue 6914 + assert (I**(I + 3)).round(3) == Float('-0.208', '')*I + + # issue 8720 + assert S(-123.6).round() == -124 + assert S(-1.5).round() == -2 + assert S(-100.5).round() == -100 + assert S(-1.5 - 10.5*I).round() == -2 - 10*I + + # issue 7961 + assert str(S(0.006).round(2)) == '0.01' + assert str(S(0.00106).round(4)) == '0.0011' + + # issue 8147 + assert S.NaN.round() is S.NaN + assert S.Infinity.round() is S.Infinity + assert S.NegativeInfinity.round() is S.NegativeInfinity + assert S.ComplexInfinity.round() is S.ComplexInfinity + + # check that types match + for i in range(2): + fi = float(i) + # 2 args + assert all(type(round(i, p)) is int for p in (-1, 0, 1)) + assert all(S(i).round(p).is_Integer for p in (-1, 0, 1)) + assert all(type(round(fi, p)) is float for p in (-1, 0, 1)) + assert all(S(fi).round(p).is_Float for p in (-1, 0, 1)) + # 1 arg (p is None) + assert type(round(i)) is int + assert S(i).round().is_Integer + assert type(round(fi)) is int + assert S(fi).round().is_Integer + + # issue 25698 + n = 6000002 + assert int(n*(log(n) + log(log(n)))) == 110130079 + one = cos(2)**2 + sin(2)**2 + eq = exp(one*I*pi) + qr, qi = eq.as_real_imag() + assert qi.round(2) == 0.0 + assert eq.round(2) == -1.0 + eq = one - 1/S(10**120) + assert S.true not in (eq > 1, eq < 1) + assert int(eq) == int(.9) == 0 + assert int(-eq) == int(-.9) == 0 + + +def test_held_expression_UnevaluatedExpr(): + x = symbols("x") + he = UnevaluatedExpr(1/x) + e1 = x*he + + assert isinstance(e1, Mul) + assert e1.args == (x, he) + assert e1.doit() == 1 + assert UnevaluatedExpr(Derivative(x, x)).doit(deep=False + ) == Derivative(x, x) + assert UnevaluatedExpr(Derivative(x, x)).doit() == 1 + + xx = Mul(x, x, evaluate=False) + assert xx != x**2 + + ue2 = UnevaluatedExpr(xx) + assert isinstance(ue2, UnevaluatedExpr) + assert ue2.args == (xx,) + assert ue2.doit() == x**2 + assert ue2.doit(deep=False) == xx + + x2 = UnevaluatedExpr(2)*2 + assert type(x2) is Mul + assert x2.args == (2, UnevaluatedExpr(2)) + +def test_round_exception_nostr(): + # Don't use the string form of the expression in the round exception, as + # it's too slow + s = Symbol('bad') + try: + s.round() + except TypeError as e: + assert 'bad' not in str(e) + else: + # Did not raise + raise AssertionError("Did not raise") + + +def test_extract_branch_factor(): + assert exp_polar(2.0*I*pi).extract_branch_factor() == (1, 1) + + +def test_identity_removal(): + assert Add.make_args(x + 0) == (x,) + assert Mul.make_args(x*1) == (x,) + + +def test_float_0(): + assert Float(0.0) + 1 == Float(1.0) + + +@XFAIL +def test_float_0_fail(): + assert Float(0.0)*x == Float(0.0) + assert (x + Float(0.0)).is_Add + + +def test_issue_6325(): + ans = (b**2 + z**2 - (b*(a + b*t) + z*(c + t*z))**2/( + (a + b*t)**2 + (c + t*z)**2))/sqrt((a + b*t)**2 + (c + t*z)**2) + e = sqrt((a + b*t)**2 + (c + z*t)**2) + assert diff(e, t, 2) == ans + assert e.diff(t, 2) == ans + assert diff(e, t, 2, simplify=False) != ans + + +def test_issue_7426(): + f1 = a % c + f2 = x % z + assert f1.equals(f2) is None + + +def test_issue_11122(): + x = Symbol('x', extended_positive=False) + assert unchanged(Gt, x, 0) # (x > 0) + # (x > 0) should remain unevaluated after PR #16956 + + x = Symbol('x', positive=False, real=True) + assert (x > 0) is S.false + + +def test_issue_10651(): + x = Symbol('x', real=True) + e1 = (-1 + x)/(1 - x) + e3 = (4*x**2 - 4)/((1 - x)*(1 + x)) + e4 = 1/(cos(x)**2) - (tan(x))**2 + x = Symbol('x', positive=True) + e5 = (1 + x)/x + assert e1.is_constant() is None + assert e3.is_constant() is None + assert e4.is_constant() is None + assert e5.is_constant() is False + + +def test_issue_10161(): + x = symbols('x', real=True) + assert x*abs(x)*abs(x) == x**3 + + +def test_issue_10755(): + x = symbols('x') + raises(TypeError, lambda: int(log(x))) + raises(TypeError, lambda: log(x).round(2)) + + +def test_issue_11877(): + x = symbols('x') + assert integrate(log(S.Half - x), (x, 0, S.Half)) == Rational(-1, 2) -log(2)/2 + + +def test_normal(): + x = symbols('x') + e = Mul(S.Half, 1 + x, evaluate=False) + assert e.normal() == e + + +def test_expr(): + x = symbols('x') + raises(TypeError, lambda: tan(x).series(x, 2, oo, "+")) + + +def test_ExprBuilder(): + eb = ExprBuilder(Mul) + eb.args.extend([x, x]) + assert eb.build() == x**2 + + +def test_issue_22020(): + from sympy.parsing.sympy_parser import parse_expr + x = parse_expr("log((2*V/3-V)/C)/-(R+r)*C") + y = parse_expr("log((2*V/3-V)/C)/-(R+r)*2") + assert x.equals(y) is False + + +def test_non_string_equality(): + # Expressions should not compare equal to strings + x = symbols('x') + one = sympify(1) + assert (x == 'x') is False + assert (x != 'x') is True + assert (one == '1') is False + assert (one != '1') is True + assert (x + 1 == 'x + 1') is False + assert (x + 1 != 'x + 1') is True + + # Make sure == doesn't try to convert the resulting expression to a string + # (e.g., by calling sympify() instead of _sympify()) + + class BadRepr: + def __repr__(self): + raise RuntimeError + + assert (x == BadRepr()) is False + assert (x != BadRepr()) is True + + +def test_21494(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert x.expr_free_symbols == {x} + + with warns_deprecated_sympy(): + assert Basic().expr_free_symbols == set() + + with warns_deprecated_sympy(): + assert S(2).expr_free_symbols == {S(2)} + + with warns_deprecated_sympy(): + assert Indexed("A", x).expr_free_symbols == {Indexed("A", x)} + + with warns_deprecated_sympy(): + assert Subs(x, x, 0).expr_free_symbols == set() + + +def test_Expr__eq__iterable_handling(): + assert x != range(3) + + +def test_format(): + assert '{:1.2f}'.format(S.Zero) == '0.00' + assert '{:+3.0f}'.format(S(3)) == ' +3' + assert '{:23.20f}'.format(pi) == ' 3.14159265358979323846' + assert '{:50.48f}'.format(exp(sin(1))) == '2.319776824715853173956590377503266813254904772376' + + +def test_issue_24045(): + assert powsimp(exp(a)/((c*a - c*b)*(Float(1.0)*c*a - Float(1.0)*c*b))) # doesn't raise + + +def test__unevaluated_Mul(): + A, B = symbols('A B', commutative=False) + assert _unevaluated_Mul(x, A, B, S(2), A).args == (2, x, A, B, A) + assert _unevaluated_Mul(-x*A*B, S(2), A).args == (-2, x, A, B, A) + + +def test_Float_zero_division_error(): + # issue 27165 + assert Float('1.7567e-1417').round(15) == Float(0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py new file mode 100644 index 0000000000000000000000000000000000000000..b550db1606866fb76442980ea2139aaf61219525 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py @@ -0,0 +1,493 @@ +"""Tests for tools for manipulating of large commutative expressions. """ + +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, oo) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.integrals.integrals import Integral +from sympy.series.order import O +from sympy.sets.sets import Interval +from sympy.simplify.radsimp import collect +from sympy.simplify.simplify import simplify +from sympy.core.exprtools import (decompose_power, Factors, Term, _gcd_terms, + gcd_terms, factor_terms, factor_nc, _mask_nc, + _monotonic_sign) +from sympy.core.mul import _keep_coeff as _keep_coeff +from sympy.simplify.cse_opts import sub_pre +from sympy.testing.pytest import raises + +from sympy.abc import a, b, t, x, y, z + + +def test_decompose_power(): + assert decompose_power(x) == (x, 1) + assert decompose_power(x**2) == (x, 2) + assert decompose_power(x**(2*y)) == (x**y, 2) + assert decompose_power(x**(2*y/3)) == (x**(y/3), 2) + assert decompose_power(x**(y*Rational(2, 3))) == (x**(y/3), 2) + + +def test_Factors(): + assert Factors() == Factors({}) == Factors(S.One) + assert Factors().as_expr() is S.One + assert Factors({x: 2, y: 3, sin(x): 4}).as_expr() == x**2*y**3*sin(x)**4 + assert Factors(S.Infinity) == Factors({oo: 1}) + assert Factors(S.NegativeInfinity) == Factors({oo: 1, -1: 1}) + # issue #18059: + assert Factors((x**2)**S.Half).as_expr() == (x**2)**S.Half + + a = Factors({x: 5, y: 3, z: 7}) + b = Factors({ y: 4, z: 3, t: 10}) + + assert a.mul(b) == a*b == Factors({x: 5, y: 7, z: 10, t: 10}) + + assert a.div(b) == divmod(a, b) == \ + (Factors({x: 5, z: 4}), Factors({y: 1, t: 10})) + assert a.quo(b) == a/b == Factors({x: 5, z: 4}) + assert a.rem(b) == a % b == Factors({y: 1, t: 10}) + + assert a.pow(3) == a**3 == Factors({x: 15, y: 9, z: 21}) + assert b.pow(3) == b**3 == Factors({y: 12, z: 9, t: 30}) + + assert a.gcd(b) == Factors({y: 3, z: 3}) + assert a.lcm(b) == Factors({x: 5, y: 4, z: 7, t: 10}) + + a = Factors({x: 4, y: 7, t: 7}) + b = Factors({z: 1, t: 3}) + + assert a.normal(b) == (Factors({x: 4, y: 7, t: 4}), Factors({z: 1})) + + assert Factors(sqrt(2)*x).as_expr() == sqrt(2)*x + + assert Factors(-I)*I == Factors() + assert Factors({S.NegativeOne: S(3)})*Factors({S.NegativeOne: S.One, I: S(5)}) == \ + Factors(I) + assert Factors(sqrt(I)*I) == Factors(I**(S(3)/2)) == Factors({I: S(3)/2}) + assert Factors({I: S(3)/2}).as_expr() == I**(S(3)/2) + + assert Factors(S(2)**x).div(S(3)**x) == \ + (Factors({S(2): x}), Factors({S(3): x})) + assert Factors(2**(2*x + 2)).div(S(8)) == \ + (Factors({S(2): 2*x + 2}), Factors({S(8): S.One})) + + # coverage + # /!\ things break if this is not True + assert Factors({S.NegativeOne: Rational(3, 2)}) == Factors({I: S.One, S.NegativeOne: S.One}) + assert Factors({I: S.One, S.NegativeOne: Rational(1, 3)}).as_expr() == I*(-1)**Rational(1, 3) + + assert Factors(-1.) == Factors({S.NegativeOne: S.One, S(1.): 1}) + assert Factors(-2.) == Factors({S.NegativeOne: S.One, S(2.): 1}) + assert Factors((-2.)**x) == Factors({S(-2.): x}) + assert Factors(S(-2)) == Factors({S.NegativeOne: S.One, S(2): 1}) + assert Factors(S.Half) == Factors({S(2): -S.One}) + assert Factors(Rational(3, 2)) == Factors({S(3): S.One, S(2): S.NegativeOne}) + assert Factors({I: S.One}) == Factors(I) + assert Factors({-1.0: 2, I: 1}) == Factors({S(1.0): 1, I: 1}) + assert Factors({S.NegativeOne: Rational(-3, 2)}).as_expr() == I + A = symbols('A', commutative=False) + assert Factors(2*A**2) == Factors({S(2): 1, A**2: 1}) + assert Factors(I) == Factors({I: S.One}) + assert Factors(x).normal(S(2)) == (Factors(x), Factors(S(2))) + assert Factors(x).normal(S.Zero) == (Factors(), Factors(S.Zero)) + raises(ZeroDivisionError, lambda: Factors(x).div(S.Zero)) + assert Factors(x).mul(S(2)) == Factors(2*x) + assert Factors(x).mul(S.Zero).is_zero + assert Factors(x).mul(1/x).is_one + assert Factors(x**sqrt(2)**3).as_expr() == x**(2*sqrt(2)) + assert Factors(x)**Factors(S(2)) == Factors(x**2) + assert Factors(x).gcd(S.Zero) == Factors(x) + assert Factors(x).lcm(S.Zero).is_zero + assert Factors(S.Zero).div(x) == (Factors(S.Zero), Factors()) + assert Factors(x).div(x) == (Factors(), Factors()) + assert Factors({x: .2})/Factors({x: .2}) == Factors() + assert Factors(x) != Factors() + assert Factors(S.Zero).normal(x) == (Factors(S.Zero), Factors()) + n, d = x**(2 + y), x**2 + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors(x**y), Factors()) + assert f.gcd(d) == Factors() + d = x**y + assert f.div(d) == f.normal(d) == (Factors(x**2), Factors()) + assert f.gcd(d) == Factors(d) + n = d = 2**x + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors(), Factors()) + assert f.gcd(d) == Factors(d) + n, d = 2**x, 2**y + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors({S(2): x}), Factors({S(2): y})) + assert f.gcd(d) == Factors() + + # extraction of constant only + n = x**(x + 3) + assert Factors(n).normal(x**-3) == (Factors({x: x + 6}), Factors({})) + assert Factors(n).normal(x**3) == (Factors({x: x}), Factors({})) + assert Factors(n).normal(x**4) == (Factors({x: x}), Factors({x: 1})) + assert Factors(n).normal(x**(y - 3)) == \ + (Factors({x: x + 6}), Factors({x: y})) + assert Factors(n).normal(x**(y + 3)) == (Factors({x: x}), Factors({x: y})) + assert Factors(n).normal(x**(y + 4)) == \ + (Factors({x: x}), Factors({x: y + 1})) + + assert Factors(n).div(x**-3) == (Factors({x: x + 6}), Factors({})) + assert Factors(n).div(x**3) == (Factors({x: x}), Factors({})) + assert Factors(n).div(x**4) == (Factors({x: x}), Factors({x: 1})) + assert Factors(n).div(x**(y - 3)) == \ + (Factors({x: x + 6}), Factors({x: y})) + assert Factors(n).div(x**(y + 3)) == (Factors({x: x}), Factors({x: y})) + assert Factors(n).div(x**(y + 4)) == \ + (Factors({x: x}), Factors({x: y + 1})) + + assert Factors(3 * x / 2) == Factors({3: 1, 2: -1, x: 1}) + assert Factors(x * x / y) == Factors({x: 2, y: -1}) + assert Factors(27 * x / y**9) == Factors({27: 1, x: 1, y: -9}) + + +def test_Term(): + a = Term(4*x*y**2/z/t**3) + b = Term(2*x**3*y**5/t**3) + + assert a == Term(4, Factors({x: 1, y: 2}), Factors({z: 1, t: 3})) + assert b == Term(2, Factors({x: 3, y: 5}), Factors({t: 3})) + + assert a.as_expr() == 4*x*y**2/z/t**3 + assert b.as_expr() == 2*x**3*y**5/t**3 + + assert a.inv() == \ + Term(S.One/4, Factors({z: 1, t: 3}), Factors({x: 1, y: 2})) + assert b.inv() == Term(S.Half, Factors({t: 3}), Factors({x: 3, y: 5})) + + assert a.mul(b) == a*b == \ + Term(8, Factors({x: 4, y: 7}), Factors({z: 1, t: 6})) + assert a.quo(b) == a/b == Term(2, Factors({}), Factors({x: 2, y: 3, z: 1})) + + assert a.pow(3) == a**3 == \ + Term(64, Factors({x: 3, y: 6}), Factors({z: 3, t: 9})) + assert b.pow(3) == b**3 == Term(8, Factors({x: 9, y: 15}), Factors({t: 9})) + + assert a.pow(-3) == a**(-3) == \ + Term(S.One/64, Factors({z: 3, t: 9}), Factors({x: 3, y: 6})) + assert b.pow(-3) == b**(-3) == \ + Term(S.One/8, Factors({t: 9}), Factors({x: 9, y: 15})) + + assert a.gcd(b) == Term(2, Factors({x: 1, y: 2}), Factors({t: 3})) + assert a.lcm(b) == Term(4, Factors({x: 3, y: 5}), Factors({z: 1, t: 3})) + + a = Term(4*x*y**2/z/t**3) + b = Term(2*x**3*y**5*t**7) + + assert a.mul(b) == Term(8, Factors({x: 4, y: 7, t: 4}), Factors({z: 1})) + + assert Term((2*x + 2)**3) == Term(8, Factors({x + 1: 3}), Factors({})) + assert Term((2*x + 2)*(3*x + 6)**2) == \ + Term(18, Factors({x + 1: 1, x + 2: 2}), Factors({})) + + +def test_gcd_terms(): + f = 2*(x + 1)*(x + 4)/(5*x**2 + 5) + (2*x + 2)*(x + 5)/(x**2 + 1)/5 + \ + (2*x + 2)*(x + 6)/(5*x**2 + 5) + + assert _gcd_terms(f) == ((Rational(6, 5))*((1 + x)/(1 + x**2)), 5 + x, 1) + assert _gcd_terms(Add.make_args(f)) == \ + ((Rational(6, 5))*((1 + x)/(1 + x**2)), 5 + x, 1) + + newf = (Rational(6, 5))*((1 + x)*(5 + x)/(1 + x**2)) + assert gcd_terms(f) == newf + args = Add.make_args(f) + # non-Basic sequences of terms treated as terms of Add + assert gcd_terms(list(args)) == newf + assert gcd_terms(tuple(args)) == newf + assert gcd_terms(set(args)) == newf + # but a Basic sequence is treated as a container + assert gcd_terms(Tuple(*args)) != newf + assert gcd_terms(Basic(Tuple(S(1), 3*y + 3*x*y), Tuple(S(1), S(3)))) == \ + Basic(Tuple(S(1), 3*y*(x + 1)), Tuple(S(1), S(3))) + # but we shouldn't change keys of a dictionary or some may be lost + assert gcd_terms(Dict((x*(1 + y), S(2)), (x + x*y, y + x*y))) == \ + Dict({x*(y + 1): S(2), x + x*y: y*(1 + x)}) + + assert gcd_terms((2*x + 2)**3 + (2*x + 2)**2) == 4*(x + 1)**2*(2*x + 3) + + assert gcd_terms(0) == 0 + assert gcd_terms(1) == 1 + assert gcd_terms(x) == x + assert gcd_terms(2 + 2*x) == Mul(2, 1 + x, evaluate=False) + arg = x*(2*x + 4*y) + garg = 2*x*(x + 2*y) + assert gcd_terms(arg) == garg + assert gcd_terms(sin(arg)) == sin(garg) + + # issue 6139-like + alpha, alpha1, alpha2, alpha3 = symbols('alpha:4') + a = alpha**2 - alpha*x**2 + alpha + x**3 - x*(alpha + 1) + rep = (alpha, (1 + sqrt(5))/2 + alpha1*x + alpha2*x**2 + alpha3*x**3) + s = (a/(x - alpha)).subs(*rep).series(x, 0, 1) + assert simplify(collect(s, x)) == -sqrt(5)/2 - Rational(3, 2) + O(x) + + # issue 5917 + assert _gcd_terms([S.Zero, S.Zero]) == (0, 0, 1) + assert _gcd_terms([2*x + 4]) == (2, x + 2, 1) + + eq = x/(x + 1/x) + assert gcd_terms(eq, fraction=False) == eq + eq = x/2/y + 1/x/y + assert gcd_terms(eq, fraction=True, clear=True) == \ + (x**2 + 2)/(2*x*y) + assert gcd_terms(eq, fraction=True, clear=False) == \ + (x**2/2 + 1)/(x*y) + assert gcd_terms(eq, fraction=False, clear=True) == \ + (x + 2/x)/(2*y) + assert gcd_terms(eq, fraction=False, clear=False) == \ + (x/2 + 1/x)/y + + +def test_factor_terms(): + A = Symbol('A', commutative=False) + assert factor_terms(9*(x + x*y + 1) + (3*x + 3)**(2 + 2*x)) == \ + 9*x*y + 9*x + _keep_coeff(S(3), x + 1)**_keep_coeff(S(2), x + 1) + 9 + assert factor_terms(9*(x + x*y + 1) + (3)**(2 + 2*x)) == \ + _keep_coeff(S(9), 3**(2*x) + x*y + x + 1) + assert factor_terms(3**(2 + 2*x) + a*3**(2 + 2*x)) == \ + 9*3**(2*x)*(a + 1) + assert factor_terms(x + x*A) == \ + x*(1 + A) + assert factor_terms(sin(x + x*A)) == \ + sin(x*(1 + A)) + assert factor_terms((3*x + 3)**((2 + 2*x)/3)) == \ + _keep_coeff(S(3), x + 1)**_keep_coeff(Rational(2, 3), x + 1) + assert factor_terms(x + (x*y + x)**(3*x + 3)) == \ + x + (x*(y + 1))**_keep_coeff(S(3), x + 1) + assert factor_terms(a*(x + x*y) + b*(x*2 + y*x*2)) == \ + x*(a + 2*b)*(y + 1) + i = Integral(x, (x, 0, oo)) + assert factor_terms(i) == i + + assert factor_terms(x/2 + y) == x/2 + y + # fraction doesn't apply to integer denominators + assert factor_terms(x/2 + y, fraction=True) == x/2 + y + # clear *does* apply to the integer denominators + assert factor_terms(x/2 + y, clear=True) == Mul(S.Half, x + 2*y, evaluate=False) + + # check radical extraction + eq = sqrt(2) + sqrt(10) + assert factor_terms(eq) == eq + assert factor_terms(eq, radical=True) == sqrt(2)*(1 + sqrt(5)) + eq = root(-6, 3) + root(6, 3) + assert factor_terms(eq, radical=True) == 6**(S.One/3)*(1 + (-1)**(S.One/3)) + + eq = [x + x*y] + ans = [x*(y + 1)] + for c in [list, tuple, set]: + assert factor_terms(c(eq)) == c(ans) + assert factor_terms(Tuple(x + x*y)) == Tuple(x*(y + 1)) + assert factor_terms(Interval(0, 1)) == Interval(0, 1) + e = 1/sqrt(a/2 + 1) + assert factor_terms(e, clear=False) == 1/sqrt(a/2 + 1) + assert factor_terms(e, clear=True) == sqrt(2)/sqrt(a + 2) + + eq = x/(x + 1/x) + 1/(x**2 + 1) + assert factor_terms(eq, fraction=False) == eq + assert factor_terms(eq, fraction=True) == 1 + + assert factor_terms((1/(x**3 + x**2) + 2/x**2)*y) == \ + y*(2 + 1/(x + 1))/x**2 + + # if not True, then processesing for this in factor_terms is not necessary + assert gcd_terms(-x - y) == -x - y + assert factor_terms(-x - y) == Mul(-1, x + y, evaluate=False) + + # if not True, then "special" processesing in factor_terms is not necessary + assert gcd_terms(exp(Mul(-1, x + 1))) == exp(-x - 1) + e = exp(-x - 2) + x + assert factor_terms(e) == exp(Mul(-1, x + 2, evaluate=False)) + x + assert factor_terms(e, sign=False) == e + assert factor_terms(exp(-4*x - 2) - x) == -x + exp(Mul(-2, 2*x + 1, evaluate=False)) + + # sum/integral tests + for F in (Sum, Integral): + assert factor_terms(F(x, (y, 1, 10))) == x * F(1, (y, 1, 10)) + assert factor_terms(F(x, (y, 1, 10)) + x) == x * (1 + F(1, (y, 1, 10))) + assert factor_terms(F(x*y + x*y**2, (y, 1, 10))) == x*F(y*(y + 1), (y, 1, 10)) + + # expressions involving Pow terms with base 0 + assert factor_terms(0**(x - 2) - 1) == 0**(x - 2) - 1 + assert factor_terms(0**(x + 2) - 1) == 0**(x + 2) - 1 + assert factor_terms((0**(x + 2) - 1).subs(x,-2)) == 0 + + +def test_xreplace(): + e = Mul(2, 1 + x, evaluate=False) + assert e.xreplace({}) == e + assert e.xreplace({y: x}) == e + + +def test_factor_nc(): + x, y = symbols('x,y') + k = symbols('k', integer=True) + n, m, o = symbols('n,m,o', commutative=False) + + # mul and multinomial expansion is needed + from sympy.core.function import _mexpand + e = x*(1 + y)**2 + assert _mexpand(e) == x + x*2*y + x*y**2 + + def factor_nc_test(e): + ex = _mexpand(e) + assert ex.is_Add + f = factor_nc(ex) + assert not f.is_Add and _mexpand(f) == ex + + factor_nc_test(x*(1 + y)) + factor_nc_test(n*(x + 1)) + factor_nc_test(n*(x + m)) + factor_nc_test((x + m)*n) + factor_nc_test(n*m*(x*o + n*o*m)*n) + s = Sum(x, (x, 1, 2)) + factor_nc_test(x*(1 + s)) + factor_nc_test(x*(1 + s)*s) + factor_nc_test(x*(1 + sin(s))) + factor_nc_test((1 + n)**2) + + factor_nc_test((x + n)*(x + m)*(x + y)) + factor_nc_test(x*(n*m + 1)) + factor_nc_test(x*(n*m + x)) + factor_nc_test(x*(x*n*m + 1)) + factor_nc_test(n*(m/x + o)) + factor_nc_test(m*(n + o/2)) + factor_nc_test(x*n*(x*m + 1)) + factor_nc_test(x*(m*n + x*n*m)) + factor_nc_test(n*(1 - m)*n**2) + + factor_nc_test((n + m)**2) + factor_nc_test((n - m)*(n + m)**2) + factor_nc_test((n + m)**2*(n - m)) + factor_nc_test((m - n)*(n + m)**2*(n - m)) + + assert factor_nc(n*(n + n*m)) == n**2*(1 + m) + assert factor_nc(m*(m*n + n*m*n**2)) == m*(m + n*m*n)*n + eq = m*sin(n) - sin(n)*m + assert factor_nc(eq) == eq + + # for coverage: + from sympy.physics.secondquant import Commutator + from sympy.polys.polytools import factor + eq = 1 + x*Commutator(m, n) + assert factor_nc(eq) == eq + eq = x*Commutator(m, n) + x*Commutator(m, o)*Commutator(m, n) + assert factor(eq) == x*(1 + Commutator(m, o))*Commutator(m, n) + + # issue 6534 + assert (2*n + 2*m).factor() == 2*(n + m) + + # issue 6701 + _n = symbols('nz', zero=False, commutative=False) + assert factor_nc(_n**k + _n**(k + 1)) == _n**k*(1 + _n) + assert factor_nc((m*n)**k + (m*n)**(k + 1)) == (1 + m*n)*(m*n)**k + + # issue 6918 + assert factor_nc(-n*(2*x**2 + 2*x)) == -2*n*x*(x + 1) + + +def test_issue_6360(): + a, b = symbols("a b") + apb = a + b + eq = apb + apb**2*(-2*a - 2*b) + assert factor_terms(sub_pre(eq)) == a + b - 2*(a + b)**3 + + +def test_issue_7903(): + a = symbols(r'a', real=True) + t = exp(I*cos(a)) + exp(-I*sin(a)) + assert t.simplify() + +def test_issue_8263(): + F, G = symbols('F, G', commutative=False, cls=Function) + x, y = symbols('x, y') + expr, dummies, _ = _mask_nc(F(x)*G(y) - G(y)*F(x)) + for v in dummies.values(): + assert not v.is_commutative + assert not expr.is_zero + +def test_monotonic_sign(): + F = _monotonic_sign + x = symbols('x') + assert F(x) is None + assert F(-x) is None + assert F(Dummy(prime=True)) == 2 + assert F(Dummy(prime=True, odd=True)) == 3 + assert F(Dummy(composite=True)) == 4 + assert F(Dummy(composite=True, odd=True)) == 9 + assert F(Dummy(positive=True, integer=True)) == 1 + assert F(Dummy(positive=True, even=True)) == 2 + assert F(Dummy(positive=True, even=True, prime=False)) == 4 + assert F(Dummy(negative=True, integer=True)) == -1 + assert F(Dummy(negative=True, even=True)) == -2 + assert F(Dummy(zero=True)) == 0 + assert F(Dummy(nonnegative=True)) == 0 + assert F(Dummy(nonpositive=True)) == 0 + + assert F(Dummy(positive=True) + 1).is_positive + assert F(Dummy(positive=True, integer=True) - 1).is_nonnegative + assert F(Dummy(positive=True) - 1) is None + assert F(Dummy(negative=True) + 1) is None + assert F(Dummy(negative=True, integer=True) - 1).is_nonpositive + assert F(Dummy(negative=True) - 1).is_negative + assert F(-Dummy(positive=True) + 1) is None + assert F(-Dummy(positive=True, integer=True) - 1).is_negative + assert F(-Dummy(positive=True) - 1).is_negative + assert F(-Dummy(negative=True) + 1).is_positive + assert F(-Dummy(negative=True, integer=True) - 1).is_nonnegative + assert F(-Dummy(negative=True) - 1) is None + x = Dummy(negative=True) + assert F(x**3).is_nonpositive + assert F(x**3 + log(2)*x - 1).is_negative + x = Dummy(positive=True) + assert F(-x**3).is_nonpositive + + p = Dummy(positive=True) + assert F(1/p).is_positive + assert F(p/(p + 1)).is_positive + p = Dummy(nonnegative=True) + assert F(p/(p + 1)).is_nonnegative + p = Dummy(positive=True) + assert F(-1/p).is_negative + p = Dummy(nonpositive=True) + assert F(p/(-p + 1)).is_nonpositive + + p = Dummy(positive=True, integer=True) + q = Dummy(positive=True, integer=True) + assert F(-2/p/q).is_negative + assert F(-2/(p - 1)/q) is None + + assert F((p - 1)*q + 1).is_positive + assert F(-(p - 1)*q - 1).is_negative + +def test_issue_17256(): + from sympy.sets.fancysets import Range + x = Symbol('x') + s1 = Sum(x + 1, (x, 1, 9)) + s2 = Sum(x + 1, (x, Range(1, 10))) + a = Symbol('a') + r1 = s1.xreplace({x:a}) + r2 = s2.xreplace({x:a}) + + assert r1.doit() == r2.doit() + s1 = Sum(x + 1, (x, 0, 9)) + s2 = Sum(x + 1, (x, Range(10))) + a = Symbol('a') + r1 = s1.xreplace({x:a}) + r2 = s2.xreplace({x:a}) + assert r1 == r2 + +def test_issue_21623(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + M = MatrixSymbol('X', 2, 2) + assert gcd_terms(M[0,0], 1) == M[0,0] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_facts.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_facts.py new file mode 100644 index 0000000000000000000000000000000000000000..7ca04877d0bdaf8124258ea1d25a10bcfa0f5f3a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_facts.py @@ -0,0 +1,312 @@ +from sympy.core.facts import (deduce_alpha_implications, + apply_beta_to_alpha_route, rules_2prereq, FactRules, FactKB) +from sympy.core.logic import And, Not +from sympy.testing.pytest import raises + +T = True +F = False +U = None + + +def test_deduce_alpha_implications(): + def D(i): + I = deduce_alpha_implications(i) + P = rules_2prereq({ + (k, True): {(v, True) for v in S} for k, S in I.items()}) + return I, P + + # transitivity + I, P = D([('a', 'b'), ('b', 'c')]) + assert I == {'a': {'b', 'c'}, 'b': {'c'}, Not('b'): + {Not('a')}, Not('c'): {Not('a'), Not('b')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + # Duplicate entry + I, P = D([('a', 'b'), ('b', 'c'), ('b', 'c')]) + assert I == {'a': {'b', 'c'}, 'b': {'c'}, Not('b'): {Not('a')}, Not('c'): {Not('a'), Not('b')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + # see if it is tolerant to cycles + assert D([('a', 'a'), ('a', 'a')]) == ({}, {}) + assert D([('a', 'b'), ('b', 'a')]) == ( + {'a': {'b'}, 'b': {'a'}, Not('a'): {Not('b')}, Not('b'): {Not('a')}}, + {'a': {'b'}, 'b': {'a'}}) + + # see if it catches inconsistency + raises(ValueError, lambda: D([('a', Not('a'))])) + raises(ValueError, lambda: D([('a', 'b'), ('b', Not('a'))])) + raises(ValueError, lambda: D([('a', 'b'), ('b', 'c'), ('b', 'na'), + ('na', Not('a'))])) + + # see if it handles implications with negations + I, P = D([('a', Not('b')), ('c', 'b')]) + assert I == {'a': {Not('b'), Not('c')}, 'b': {Not('a')}, 'c': {'b', Not('a')}, Not('b'): {Not('c')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + I, P = D([(Not('a'), 'b'), ('a', 'c')]) + assert I == {'a': {'c'}, Not('a'): {'b'}, Not('b'): {'a', + 'c'}, Not('c'): {Not('a'), 'b'},} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + + # Long deductions + I, P = D([('a', 'b'), ('b', 'c'), ('c', 'd'), ('d', 'e')]) + assert I == {'a': {'b', 'c', 'd', 'e'}, 'b': {'c', 'd', 'e'}, + 'c': {'d', 'e'}, 'd': {'e'}, Not('b'): {Not('a')}, + Not('c'): {Not('a'), Not('b')}, Not('d'): {Not('a'), Not('b'), + Not('c')}, Not('e'): {Not('a'), Not('b'), Not('c'), Not('d')}} + assert P == {'a': {'b', 'c', 'd', 'e'}, 'b': {'a', 'c', 'd', + 'e'}, 'c': {'a', 'b', 'd', 'e'}, 'd': {'a', 'b', 'c', 'e'}, + 'e': {'a', 'b', 'c', 'd'}} + + # something related to real-world + I, P = D([('rat', 'real'), ('int', 'rat')]) + + assert I == {'int': {'rat', 'real'}, 'rat': {'real'}, + Not('real'): {Not('rat'), Not('int')}, Not('rat'): {Not('int')}} + assert P == {'rat': {'int', 'real'}, 'real': {'int', 'rat'}, + 'int': {'rat', 'real'}} + + +# TODO move me to appropriate place +def test_apply_beta_to_alpha_route(): + APPLY = apply_beta_to_alpha_route + + # indicates empty alpha-chain with attached beta-rule #bidx + def Q(bidx): + return (set(), [bidx]) + + # x -> a &(a,b) -> x -- x -> a + A = {'x': {'a'}} + B = [(And('a', 'b'), 'x')] + assert APPLY(A, B) == {'x': ({'a'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a &(a,!x) -> b -- x -> a + A = {'x': {'a'}} + B = [(And('a', Not('x')), 'b')] + assert APPLY(A, B) == {'x': ({'a'}, []), Not('x'): Q(0), 'a': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c + A = {'x': {'a', 'b'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b', 'c'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a &(a,b) -> y -- x -> a [#0] + A = {'x': {'a'}} + B = [(And('a', 'b'), 'y')] + assert APPLY(A, B) == {'x': ({'a'}, [0]), 'a': Q(0), 'b': Q(0)} + + # x -> a b c &(a,b) -> c -- x -> a b c + A = {'x': {'a', 'b', 'c'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b', 'c'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a b &(a,b,c) -> y -- x -> a b [#0] + A = {'x': {'a', 'b'}} + B = [(And('a', 'b', 'c'), 'y')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b'}, [0]), 'a': Q(0), 'b': Q(0), 'c': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c d + # c -> d c -> d + A = {'x': {'a', 'b'}, 'c': {'d'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'd'}, []), + 'c': ({'d'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c d e + # c -> d &(c,d) -> e c -> d e + A = {'x': {'a', 'b'}, 'c': {'d'}} + B = [(And('a', 'b'), 'c'), (And('c', 'd'), 'e')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'd', 'e'}, []), + 'c': ({'d', 'e'}, []), 'a': Q(0), 'b': Q(0), 'd': Q(1)} + + # x -> a b &(a,y) -> z -- x -> a b y z + # &(a,b) -> y + A = {'x': {'a', 'b'}} + B = [(And('a', 'y'), 'z'), (And('a', 'b'), 'y')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'y', 'z'}, []), + 'a': (set(), [0, 1]), 'y': Q(0), 'b': Q(1)} + + # x -> a b &(a,!b) -> c -- x -> a b + A = {'x': {'a', 'b'}} + B = [(And('a', Not('b')), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b'}, []), 'a': Q(0), Not('b'): Q(0)} + + # !x -> !a !b &(!a,b) -> c -- !x -> !a !b + A = {Not('x'): {Not('a'), Not('b')}} + B = [(And(Not('a'), 'b'), 'c')] + assert APPLY(A, B) == \ + {Not('x'): ({Not('a'), Not('b')}, []), Not('a'): Q(0), 'b': Q(0)} + + # x -> a b &(b,c) -> !a -- x -> a b + A = {'x': {'a', 'b'}} + B = [(And('b', 'c'), Not('a'))] + assert APPLY(A, B) == {'x': ({'a', 'b'}, []), 'b': Q(0), 'c': Q(0)} + + # x -> a b &(a, b) -> c -- x -> a b c p + # c -> p a + A = {'x': {'a', 'b'}, 'c': {'p', 'a'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'p'}, []), + 'c': ({'p', 'a'}, []), 'a': Q(0), 'b': Q(0)} + + +def test_FactRules_parse(): + f = FactRules('a -> b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('a -> !b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!a -> b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!a -> !b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!z == nz') + assert f.prereq == {'z': {'nz'}, 'nz': {'z'}} + + +def test_FactRules_parse2(): + raises(ValueError, lambda: FactRules('a -> !a')) + + +def test_FactRules_deduce(): + f = FactRules(['a -> b', 'b -> c', 'b -> d', 'c -> e']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'a': T}) == {'a': T, 'b': T, 'c': T, 'd': T, 'e': T} + assert D({'b': T}) == { 'b': T, 'c': T, 'd': T, 'e': T} + assert D({'c': T}) == { 'c': T, 'e': T} + assert D({'d': T}) == { 'd': T } + assert D({'e': T}) == { 'e': T} + + assert D({'a': F}) == {'a': F } + assert D({'b': F}) == {'a': F, 'b': F } + assert D({'c': F}) == {'a': F, 'b': F, 'c': F } + assert D({'d': F}) == {'a': F, 'b': F, 'd': F } + + assert D({'a': U}) == {'a': U} # XXX ok? + + +def test_FactRules_deduce2(): + # pos/neg/zero, but the rules are not sufficient to derive all relations + f = FactRules(['pos -> !neg', 'pos -> !z']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'pos': T}) == {'pos': T, 'neg': F, 'z': F} + assert D({'pos': F}) == {'pos': F } + assert D({'neg': T}) == {'pos': F, 'neg': T } + assert D({'neg': F}) == { 'neg': F } + assert D({'z': T}) == {'pos': F, 'z': T} + assert D({'z': F}) == { 'z': F} + + # pos/neg/zero. rules are sufficient to derive all relations + f = FactRules(['pos -> !neg', 'neg -> !pos', 'pos -> !z', 'neg -> !z']) + + assert D({'pos': T}) == {'pos': T, 'neg': F, 'z': F} + assert D({'pos': F}) == {'pos': F } + assert D({'neg': T}) == {'pos': F, 'neg': T, 'z': F} + assert D({'neg': F}) == { 'neg': F } + assert D({'z': T}) == {'pos': F, 'neg': F, 'z': T} + assert D({'z': F}) == { 'z': F} + + +def test_FactRules_deduce_multiple(): + # deduction that involves _several_ starting points + f = FactRules(['real == pos | npos']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'real': T}) == {'real': T} + assert D({'real': F}) == {'real': F, 'pos': F, 'npos': F} + assert D({'pos': T}) == {'real': T, 'pos': T} + assert D({'npos': T}) == {'real': T, 'npos': T} + + # --- key tests below --- + assert D({'pos': F, 'npos': F}) == {'real': F, 'pos': F, 'npos': F} + assert D({'real': T, 'pos': F}) == {'real': T, 'pos': F, 'npos': T} + assert D({'real': T, 'npos': F}) == {'real': T, 'pos': T, 'npos': F} + + assert D({'pos': T, 'npos': F}) == {'real': T, 'pos': T, 'npos': F} + assert D({'pos': F, 'npos': T}) == {'real': T, 'pos': F, 'npos': T} + + +def test_FactRules_deduce_multiple2(): + f = FactRules(['real == neg | zero | pos']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'real': T}) == {'real': T} + assert D({'real': F}) == {'real': F, 'neg': F, 'zero': F, 'pos': F} + assert D({'neg': T}) == {'real': T, 'neg': T} + assert D({'zero': T}) == {'real': T, 'zero': T} + assert D({'pos': T}) == {'real': T, 'pos': T} + + # --- key tests below --- + assert D({'neg': F, 'zero': F, 'pos': F}) == {'real': F, 'neg': F, + 'zero': F, 'pos': F} + assert D({'real': T, 'neg': F}) == {'real': T, 'neg': F} + assert D({'real': T, 'zero': F}) == {'real': T, 'zero': F} + assert D({'real': T, 'pos': F}) == {'real': T, 'pos': F} + + assert D({'real': T, 'zero': F, 'pos': F}) == {'real': T, + 'neg': T, 'zero': F, 'pos': F} + assert D({'real': T, 'neg': F, 'pos': F}) == {'real': T, + 'neg': F, 'zero': T, 'pos': F} + assert D({'real': T, 'neg': F, 'zero': F }) == {'real': T, + 'neg': F, 'zero': F, 'pos': T} + + assert D({'neg': T, 'zero': F, 'pos': F}) == {'real': T, 'neg': T, + 'zero': F, 'pos': F} + assert D({'neg': F, 'zero': T, 'pos': F}) == {'real': T, 'neg': F, + 'zero': T, 'pos': F} + assert D({'neg': F, 'zero': F, 'pos': T}) == {'real': T, 'neg': F, + 'zero': F, 'pos': T} + + +def test_FactRules_deduce_base(): + # deduction that starts from base + + f = FactRules(['real == neg | zero | pos', + 'neg -> real & !zero & !pos', + 'pos -> real & !zero & !neg']) + base = FactKB(f) + + base.deduce_all_facts({'real': T, 'neg': F}) + assert base == {'real': T, 'neg': F} + + base.deduce_all_facts({'zero': F}) + assert base == {'real': T, 'neg': F, 'zero': F, 'pos': T} + + +def test_FactRules_deduce_staticext(): + # verify that static beta-extensions deduction takes place + f = FactRules(['real == neg | zero | pos', + 'neg -> real & !zero & !pos', + 'pos -> real & !zero & !neg', + 'nneg == real & !neg', + 'npos == real & !pos']) + + assert ('npos', True) in f.full_implications[('neg', True)] + assert ('nneg', True) in f.full_implications[('pos', True)] + assert ('nneg', True) in f.full_implications[('zero', True)] + assert ('npos', True) in f.full_implications[('zero', True)] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_function.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_function.py new file mode 100644 index 0000000000000000000000000000000000000000..a69c6b81b786ab0f0592367eaf402c2165a615dc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_function.py @@ -0,0 +1,1459 @@ +from sympy.concrete.summations import Sum +from sympy.core.basic import Basic, _aresame +from sympy.core.cache import clear_cache +from sympy.core.containers import Dict, Tuple +from sympy.core.expr import Expr, unchanged +from sympy.core.function import (Subs, Function, diff, Lambda, expand, + nfloat, Derivative) +from sympy.core.numbers import E, Float, zoo, Rational, pi, I, oo, nan +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols, Dummy, Symbol +from sympy.functions.elementary.complexes import im, re +from sympy.functions.elementary.exponential import log, exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin, cos, acos +from sympy.functions.special.error_functions import expint +from sympy.functions.special.gamma_functions import loggamma, polygamma +from sympy.matrices.dense import Matrix +from sympy.printing.str import sstr +from sympy.series.order import O +from sympy.tensor.indexed import Indexed +from sympy.core.function import (PoleError, _mexpand, arity, + BadSignatureError, BadArgumentsError) +from sympy.core.parameters import _exp_is_pow +from sympy.core.sympify import sympify, SympifyError +from sympy.matrices import MutableMatrix, ImmutableMatrix +from sympy.sets.sets import FiniteSet +from sympy.solvers.solveset import solveset +from sympy.tensor.array import NDimArray +from sympy.utilities.iterables import subsets, variations +from sympy.testing.pytest import XFAIL, raises, warns_deprecated_sympy, _both_exp_pow + +from sympy.abc import t, w, x, y, z +f, g, h = symbols('f g h', cls=Function) +_xi_1, _xi_2, _xi_3 = [Dummy() for i in range(3)] + +def test_f_expand_complex(): + x = Symbol('x', real=True) + + assert f(x).expand(complex=True) == I*im(f(x)) + re(f(x)) + assert exp(x).expand(complex=True) == exp(x) + assert exp(I*x).expand(complex=True) == cos(x) + I*sin(x) + assert exp(z).expand(complex=True) == cos(im(z))*exp(re(z)) + \ + I*sin(im(z))*exp(re(z)) + + +def test_bug1(): + e = sqrt(-log(w)) + assert e.subs(log(w), -x) == sqrt(x) + + e = sqrt(-5*log(w)) + assert e.subs(log(w), -x) == sqrt(5*x) + + +def test_general_function(): + nu = Function('nu') + + e = nu(x) + edx = e.diff(x) + edy = e.diff(y) + edxdx = e.diff(x).diff(x) + edxdy = e.diff(x).diff(y) + assert e == nu(x) + assert edx != nu(x) + assert edx == diff(nu(x), x) + assert edy == 0 + assert edxdx == diff(diff(nu(x), x), x) + assert edxdy == 0 + +def test_general_function_nullary(): + nu = Function('nu') + + e = nu() + edx = e.diff(x) + edxdx = e.diff(x).diff(x) + assert e == nu() + assert edx != nu() + assert edx == 0 + assert edxdx == 0 + + +def test_derivative_subs_bug(): + e = diff(g(x), x) + assert e.subs(g(x), f(x)) != e + assert e.subs(g(x), f(x)) == Derivative(f(x), x) + assert e.subs(g(x), -f(x)) == Derivative(-f(x), x) + + assert e.subs(x, y) == Derivative(g(y), y) + + +def test_derivative_subs_self_bug(): + d = diff(f(x), x) + + assert d.subs(d, y) == y + + +def test_derivative_linearity(): + assert diff(-f(x), x) == -diff(f(x), x) + assert diff(8*f(x), x) == 8*diff(f(x), x) + assert diff(8*f(x), x) != 7*diff(f(x), x) + assert diff(8*f(x)*x, x) == 8*f(x) + 8*x*diff(f(x), x) + assert diff(8*f(x)*y*x, x).expand() == 8*y*f(x) + 8*y*x*diff(f(x), x) + + +def test_derivative_evaluate(): + assert Derivative(sin(x), x) != diff(sin(x), x) + assert Derivative(sin(x), x).doit() == diff(sin(x), x) + + assert Derivative(Derivative(f(x), x), x) == diff(f(x), x, x) + assert Derivative(sin(x), x, 0) == sin(x) + assert Derivative(sin(x), (x, y), (x, -y)) == sin(x) + + +def test_diff_symbols(): + assert diff(f(x, y, z), x, y, z) == Derivative(f(x, y, z), x, y, z) + assert diff(f(x, y, z), x, x, x) == Derivative(f(x, y, z), x, x, x) == Derivative(f(x, y, z), (x, 3)) + assert diff(f(x, y, z), x, 3) == Derivative(f(x, y, z), x, 3) + + # issue 5028 + assert [diff(-z + x/y, sym) for sym in (z, x, y)] == [-1, 1/y, -x/y**2] + assert diff(f(x, y, z), x, y, z, 2) == Derivative(f(x, y, z), x, y, z, z) + assert diff(f(x, y, z), x, y, z, 2, evaluate=False) == \ + Derivative(f(x, y, z), x, y, z, z) + assert Derivative(f(x, y, z), x, y, z)._eval_derivative(z) == \ + Derivative(f(x, y, z), x, y, z, z) + assert Derivative(Derivative(f(x, y, z), x), y)._eval_derivative(z) == \ + Derivative(f(x, y, z), x, y, z) + + raises(TypeError, lambda: cos(x).diff((x, y)).variables) + assert cos(x).diff((x, y))._wrt_variables == [x] + + # issue 23222 + assert sympify("a*x+b").diff("x") == sympify("a") + +def test_Function(): + class myfunc(Function): + @classmethod + def eval(cls): # zero args + return + + assert myfunc.nargs == FiniteSet(0) + assert myfunc().nargs == FiniteSet(0) + raises(TypeError, lambda: myfunc(x).nargs) + + class myfunc(Function): + @classmethod + def eval(cls, x): # one arg + return + + assert myfunc.nargs == FiniteSet(1) + assert myfunc(x).nargs == FiniteSet(1) + raises(TypeError, lambda: myfunc(x, y).nargs) + + class myfunc(Function): + @classmethod + def eval(cls, *x): # star args + return + + assert myfunc.nargs == S.Naturals0 + assert myfunc(x).nargs == S.Naturals0 + + +def test_nargs(): + f = Function('f') + assert f.nargs == S.Naturals0 + assert f(1).nargs == S.Naturals0 + assert Function('f', nargs=2)(1, 2).nargs == FiniteSet(2) + assert sin.nargs == FiniteSet(1) + assert sin(2).nargs == FiniteSet(1) + assert log.nargs == FiniteSet(1, 2) + assert log(2).nargs == FiniteSet(1, 2) + assert Function('f', nargs=2).nargs == FiniteSet(2) + assert Function('f', nargs=0).nargs == FiniteSet(0) + assert Function('f', nargs=(0, 1)).nargs == FiniteSet(0, 1) + assert Function('f', nargs=None).nargs == S.Naturals0 + raises(ValueError, lambda: Function('f', nargs=())) + +def test_nargs_inheritance(): + class f1(Function): + nargs = 2 + class f2(f1): + pass + class f3(f2): + pass + class f4(f3): + nargs = 1,2 + class f5(f4): + pass + class f6(f5): + pass + class f7(f6): + nargs=None + class f8(f7): + pass + class f9(f8): + pass + class f10(f9): + nargs = 1 + class f11(f10): + pass + assert f1.nargs == FiniteSet(2) + assert f2.nargs == FiniteSet(2) + assert f3.nargs == FiniteSet(2) + assert f4.nargs == FiniteSet(1, 2) + assert f5.nargs == FiniteSet(1, 2) + assert f6.nargs == FiniteSet(1, 2) + assert f7.nargs == S.Naturals0 + assert f8.nargs == S.Naturals0 + assert f9.nargs == S.Naturals0 + assert f10.nargs == FiniteSet(1) + assert f11.nargs == FiniteSet(1) + +def test_arity(): + f = lambda x, y: 1 + assert arity(f) == 2 + def f(x, y, z=None): + pass + assert arity(f) == (2, 3) + assert arity(lambda *x: x) is None + assert arity(log) == (1, 2) + + +def test_Lambda(): + e = Lambda(x, x**2) + assert e(4) == 16 + assert e(x) == x**2 + assert e(y) == y**2 + + assert Lambda((), 42)() == 42 + assert unchanged(Lambda, (), 42) + assert Lambda((), 42) != Lambda((), 43) + assert Lambda((), f(x))() == f(x) + assert Lambda((), 42).nargs == FiniteSet(0) + + assert unchanged(Lambda, (x,), x**2) + assert Lambda(x, x**2) == Lambda((x,), x**2) + assert Lambda(x, x**2) != Lambda(x, x**2 + 1) + assert Lambda((x, y), x**y) != Lambda((y, x), y**x) + assert Lambda((x, y), x**y) != Lambda((x, y), y**x) + + assert Lambda((x, y), x**y)(x, y) == x**y + assert Lambda((x, y), x**y)(3, 3) == 3**3 + assert Lambda((x, y), x**y)(x, 3) == x**3 + assert Lambda((x, y), x**y)(3, y) == 3**y + assert Lambda(x, f(x))(x) == f(x) + assert Lambda(x, x**2)(e(x)) == x**4 + assert e(e(x)) == x**4 + + x1, x2 = (Indexed('x', i) for i in (1, 2)) + assert Lambda((x1, x2), x1 + x2)(x, y) == x + y + + assert Lambda((x, y), x + y).nargs == FiniteSet(2) + + p = x, y, z, t + assert Lambda(p, t*(x + y + z))(*p) == t * (x + y + z) + + eq = Lambda(x, 2*x) + Lambda(y, 2*y) + assert eq != 2*Lambda(x, 2*x) + assert eq.as_dummy() == 2*Lambda(x, 2*x).as_dummy() + assert Lambda(x, 2*x) not in [ Lambda(x, x) ] + raises(BadSignatureError, lambda: Lambda(1, x)) + assert Lambda(x, 1)(1) is S.One + + raises(BadSignatureError, lambda: Lambda((x, x), x + 2)) + raises(BadSignatureError, lambda: Lambda(((x, x), y), x)) + raises(BadSignatureError, lambda: Lambda(((y, x), x), x)) + raises(BadSignatureError, lambda: Lambda(((y, 1), 2), x)) + + with warns_deprecated_sympy(): + assert Lambda([x, y], x+y) == Lambda((x, y), x+y) + + flam = Lambda(((x, y),), x + y) + assert flam((2, 3)) == 5 + flam = Lambda(((x, y), z), x + y + z) + assert flam((2, 3), 1) == 6 + flam = Lambda((((x, y), z),), x + y + z) + assert flam(((2, 3), 1)) == 6 + raises(BadArgumentsError, lambda: flam(1, 2, 3)) + flam = Lambda( (x,), (x, x)) + assert flam(1,) == (1, 1) + assert flam((1,)) == ((1,), (1,)) + flam = Lambda( ((x,),), (x, x)) + raises(BadArgumentsError, lambda: flam(1)) + assert flam((1,)) == (1, 1) + + # Previously TypeError was raised so this is potentially needed for + # backwards compatibility. + assert issubclass(BadSignatureError, TypeError) + assert issubclass(BadArgumentsError, TypeError) + + # These are tested to see they don't raise: + hash(Lambda(x, 2*x)) + hash(Lambda(x, x)) # IdentityFunction subclass + + +def test_IdentityFunction(): + assert Lambda(x, x) is Lambda(y, y) is S.IdentityFunction + assert Lambda(x, 2*x) is not S.IdentityFunction + assert Lambda((x, y), x) is not S.IdentityFunction + + +def test_Lambda_symbols(): + assert Lambda(x, 2*x).free_symbols == set() + assert Lambda(x, x*y).free_symbols == {y} + assert Lambda((), 42).free_symbols == set() + assert Lambda((), x*y).free_symbols == {x,y} + + +def test_functionclas_symbols(): + assert f.free_symbols == set() + + +def test_Lambda_arguments(): + raises(TypeError, lambda: Lambda(x, 2*x)(x, y)) + raises(TypeError, lambda: Lambda((x, y), x + y)(x)) + raises(TypeError, lambda: Lambda((), 42)(x)) + + +def test_Lambda_equality(): + assert Lambda((x, y), 2*x) == Lambda((x, y), 2*x) + # these, of course, should never be equal + assert Lambda(x, 2*x) != Lambda((x, y), 2*x) + assert Lambda(x, 2*x) != 2*x + # But it is tempting to want expressions that differ only + # in bound symbols to compare the same. But this is not what + # Python's `==` is intended to do; two objects that compare + # as equal means that they are indistibguishable and cache to the + # same value. We wouldn't want to expression that are + # mathematically the same but written in different variables to be + # interchanged else what is the point of allowing for different + # variable names? + assert Lambda(x, 2*x) != Lambda(y, 2*y) + + +def test_Subs(): + assert Subs(1, (), ()) is S.One + # check null subs influence on hashing + assert Subs(x, y, z) != Subs(x, y, 1) + # neutral subs works + assert Subs(x, x, 1).subs(x, y).has(y) + # self mapping var/point + assert Subs(Derivative(f(x), (x, 2)), x, x).doit() == f(x).diff(x, x) + assert Subs(x, x, 0).has(x) # it's a structural answer + assert not Subs(x, x, 0).free_symbols + assert Subs(Subs(x + y, x, 2), y, 1) == Subs(x + y, (x, y), (2, 1)) + assert Subs(x, (x,), (0,)) == Subs(x, x, 0) + assert Subs(x, x, 0) == Subs(y, y, 0) + assert Subs(x, x, 0).subs(x, 1) == Subs(x, x, 0) + assert Subs(y, x, 0).subs(y, 1) == Subs(1, x, 0) + assert Subs(f(x), x, 0).doit() == f(0) + assert Subs(f(x**2), x**2, 0).doit() == f(0) + assert Subs(f(x, y, z), (x, y, z), (0, 1, 1)) != \ + Subs(f(x, y, z), (x, y, z), (0, 0, 1)) + assert Subs(x, y, 2).subs(x, y).doit() == 2 + assert Subs(f(x, y), (x, y, z), (0, 1, 1)) != \ + Subs(f(x, y) + z, (x, y, z), (0, 1, 0)) + assert Subs(f(x, y), (x, y), (0, 1)).doit() == f(0, 1) + assert Subs(Subs(f(x, y), x, 0), y, 1).doit() == f(0, 1) + raises(ValueError, lambda: Subs(f(x, y), (x, y), (0, 0, 1))) + raises(ValueError, lambda: Subs(f(x, y), (x, x, y), (0, 0, 1))) + + assert len(Subs(f(x, y), (x, y), (0, 1)).variables) == 2 + assert Subs(f(x, y), (x, y), (0, 1)).point == Tuple(0, 1) + + assert Subs(f(x), x, 0) == Subs(f(y), y, 0) + assert Subs(f(x, y), (x, y), (0, 1)) == Subs(f(x, y), (y, x), (1, 0)) + assert Subs(f(x)*y, (x, y), (0, 1)) == Subs(f(y)*x, (y, x), (0, 1)) + assert Subs(f(x)*y, (x, y), (1, 1)) == Subs(f(y)*x, (x, y), (1, 1)) + + assert Subs(f(x), x, 0).subs(x, 1).doit() == f(0) + assert Subs(f(x), x, y).subs(y, 0) == Subs(f(x), x, 0) + assert Subs(y*f(x), x, y).subs(y, 2) == Subs(2*f(x), x, 2) + assert (2 * Subs(f(x), x, 0)).subs(Subs(f(x), x, 0), y) == 2*y + + assert Subs(f(x), x, 0).free_symbols == set() + assert Subs(f(x, y), x, z).free_symbols == {y, z} + + assert Subs(f(x).diff(x), x, 0).doit(), Subs(f(x).diff(x), x, 0) + assert Subs(1 + f(x).diff(x), x, 0).doit(), 1 + Subs(f(x).diff(x), x, 0) + assert Subs(y*f(x, y).diff(x), (x, y), (0, 2)).doit() == \ + 2*Subs(Derivative(f(x, 2), x), x, 0) + assert Subs(y**2*f(x), x, 0).diff(y) == 2*y*f(0) + + e = Subs(y**2*f(x), x, y) + assert e.diff(y) == e.doit().diff(y) == y**2*Derivative(f(y), y) + 2*y*f(y) + + assert Subs(f(x), x, 0) + Subs(f(x), x, 0) == 2*Subs(f(x), x, 0) + e1 = Subs(z*f(x), x, 1) + e2 = Subs(z*f(y), y, 1) + assert e1 + e2 == 2*e1 + assert e1.__hash__() == e2.__hash__() + assert Subs(z*f(x + 1), x, 1) not in [ e1, e2 ] + assert Derivative(f(x), x).subs(x, g(x)) == Derivative(f(g(x)), g(x)) + assert Derivative(f(x), x).subs(x, x + y) == Subs(Derivative(f(x), x), + x, x + y) + assert Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).n(2) == \ + Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).evalf(2) == \ + z + Rational('1/2').n(2)*f(0) + + assert f(x).diff(x).subs(x, 0).subs(x, y) == f(x).diff(x).subs(x, 0) + assert (x*f(x).diff(x).subs(x, 0)).subs(x, y) == y*f(x).diff(x).subs(x, 0) + assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x) + ).doit() == 2*exp(x) + assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x) + ).doit(deep=False) == 2*Derivative(exp(x), x) + assert Derivative(f(x, g(x)), x).doit() == Derivative( + f(x, g(x)), g(x))*Derivative(g(x), x) + Subs(Derivative( + f(y, g(x)), y), y, x) + +def test_doitdoit(): + done = Derivative(f(x, g(x)), x, g(x)).doit() + assert done == done.doit() + + +@XFAIL +def test_Subs2(): + # this reflects a limitation of subs(), probably won't fix + assert Subs(f(x), x**2, x).doit() == f(sqrt(x)) + + +def test_expand_function(): + assert expand(x + y) == x + y + assert expand(x + y, complex=True) == I*im(x) + I*im(y) + re(x) + re(y) + assert expand((x + y)**11, modulus=11) == x**11 + y**11 + + +def test_function_comparable(): + assert sin(x).is_comparable is False + assert cos(x).is_comparable is False + + assert sin(Float('0.1')).is_comparable is True + assert cos(Float('0.1')).is_comparable is True + + assert sin(E).is_comparable is True + assert cos(E).is_comparable is True + + assert sin(Rational(1, 3)).is_comparable is True + assert cos(Rational(1, 3)).is_comparable is True + + +def test_function_comparable_infinities(): + assert sin(oo).is_comparable is False + assert sin(-oo).is_comparable is False + assert sin(zoo).is_comparable is False + assert sin(nan).is_comparable is False + + +def test_deriv1(): + # These all require derivatives evaluated at a point (issue 4719) to work. + # See issue 4624 + assert f(2*x).diff(x) == 2*Subs(Derivative(f(x), x), x, 2*x) + assert (f(x)**3).diff(x) == 3*f(x)**2*f(x).diff(x) + assert (f(2*x)**3).diff(x) == 6*f(2*x)**2*Subs( + Derivative(f(x), x), x, 2*x) + + assert f(2 + x).diff(x) == Subs(Derivative(f(x), x), x, x + 2) + assert f(2 + 3*x).diff(x) == 3*Subs( + Derivative(f(x), x), x, 3*x + 2) + assert f(3*sin(x)).diff(x) == 3*cos(x)*Subs( + Derivative(f(x), x), x, 3*sin(x)) + + # See issue 8510 + assert f(x, x + z).diff(x) == ( + Subs(Derivative(f(y, x + z), y), y, x) + + Subs(Derivative(f(x, y), y), y, x + z)) + assert f(x, x**2).diff(x) == ( + 2*x*Subs(Derivative(f(x, y), y), y, x**2) + + Subs(Derivative(f(y, x**2), y), y, x)) + # but Subs is not always necessary + assert f(x, g(y)).diff(g(y)) == Derivative(f(x, g(y)), g(y)) + + +def test_deriv2(): + assert (x**3).diff(x) == 3*x**2 + assert (x**3).diff(x, evaluate=False) != 3*x**2 + assert (x**3).diff(x, evaluate=False) == Derivative(x**3, x) + + assert diff(x**3, x) == 3*x**2 + assert diff(x**3, x, evaluate=False) != 3*x**2 + assert diff(x**3, x, evaluate=False) == Derivative(x**3, x) + + +def test_func_deriv(): + assert f(x).diff(x) == Derivative(f(x), x) + # issue 4534 + assert f(x, y).diff(x, y) - f(x, y).diff(y, x) == 0 + assert Derivative(f(x, y), x, y).args[1:] == ((x, 1), (y, 1)) + assert Derivative(f(x, y), y, x).args[1:] == ((y, 1), (x, 1)) + assert (Derivative(f(x, y), x, y) - Derivative(f(x, y), y, x)).doit() == 0 + + +def test_suppressed_evaluation(): + a = sin(0, evaluate=False) + assert a != 0 + assert a.func is sin + assert a.args == (0,) + + +def test_function_evalf(): + def eq(a, b, eps): + return abs(a - b) < eps + assert eq(sin(1).evalf(15), Float("0.841470984807897"), 1e-13) + assert eq( + sin(2).evalf(25), Float("0.9092974268256816953960199", 25), 1e-23) + assert eq(sin(1 + I).evalf( + 15), Float("1.29845758141598") + Float("0.634963914784736")*I, 1e-13) + assert eq(exp(1 + I).evalf(15), Float( + "1.46869393991588") + Float("2.28735528717884239")*I, 1e-13) + assert eq(exp(-0.5 + 1.5*I).evalf(15), Float( + "0.0429042815937374") + Float("0.605011292285002")*I, 1e-13) + assert eq(log(pi + sqrt(2)*I).evalf( + 15), Float("1.23699044022052") + Float("0.422985442737893")*I, 1e-13) + assert eq(cos(100).evalf(15), Float("0.86231887228768"), 1e-13) + + +def test_extensibility_eval(): + class MyFunc(Function): + @classmethod + def eval(cls, *args): + return (0, 0, 0) + assert MyFunc(0) == (0, 0, 0) + + +@_both_exp_pow +def test_function_non_commutative(): + x = Symbol('x', commutative=False) + assert f(x).is_commutative is False + assert sin(x).is_commutative is False + assert exp(x).is_commutative is False + assert log(x).is_commutative is False + assert f(x).is_complex is False + assert sin(x).is_complex is False + assert exp(x).is_complex is False + assert log(x).is_complex is False + + +def test_function_complex(): + x = Symbol('x', complex=True) + xzf = Symbol('x', complex=True, zero=False) + assert f(x).is_commutative is True + assert sin(x).is_commutative is True + assert exp(x).is_commutative is True + assert log(x).is_commutative is True + assert f(x).is_complex is None + assert sin(x).is_complex is True + assert exp(x).is_complex is True + assert log(x).is_complex is None + assert log(xzf).is_complex is True + + +def test_function__eval_nseries(): + n = Symbol('n') + + assert sin(x)._eval_nseries(x, 2, None) == x + O(x**2) + assert sin(x + 1)._eval_nseries(x, 2, None) == x*cos(1) + sin(1) + O(x**2) + assert sin(pi*(1 - x))._eval_nseries(x, 2, None) == pi*x + O(x**2) + assert acos(1 - x**2)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x**2) + O(x**2) + assert polygamma(n, x + 1)._eval_nseries(x, 2, None) == \ + polygamma(n, 1) + polygamma(n + 1, 1)*x + O(x**2) + raises(PoleError, lambda: sin(1/x)._eval_nseries(x, 2, None)) + assert acos(1 - x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x) + sqrt(2)*x**(S(3)/2)/12 + O(x**2) + assert acos(1 + x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(-x) + sqrt(2)*(-x)**(S(3)/2)/12 + O(x**2) + assert loggamma(1/x)._eval_nseries(x, 0, None) == \ + log(x)/2 - log(x)/x - 1/x + O(1, x) + assert loggamma(log(1/x)).nseries(x, n=1, logx=y) == loggamma(-y) + + # issue 6725: + assert expint(Rational(3, 2), -x)._eval_nseries(x, 5, None) == \ + 2 - 2*x - x**2/3 - x**3/15 - x**4/84 - 2*I*sqrt(pi)*sqrt(x) + O(x**5) + assert sin(sqrt(x))._eval_nseries(x, 3, None) == \ + sqrt(x) - x**Rational(3, 2)/6 + x**Rational(5, 2)/120 + O(x**3) + + # issue 19065: + s1 = f(x,y).series(y, n=2) + assert {i.name for i in s1.atoms(Symbol)} == {'x', 'xi', 'y'} + xi = Symbol('xi') + s2 = f(xi, y).series(y, n=2) + assert {i.name for i in s2.atoms(Symbol)} == {'xi', 'xi0', 'y'} + +def test_doit(): + n = Symbol('n', integer=True) + f = Sum(2 * n * x, (n, 1, 3)) + d = Derivative(f, x) + assert d.doit() == 12 + assert d.doit(deep=False) == Sum(2*n, (n, 1, 3)) + + +def test_evalf_default(): + from sympy.functions.special.gamma_functions import polygamma + assert type(sin(4.0)) == Float + assert type(re(sin(I + 1.0))) == Float + assert type(im(sin(I + 1.0))) == Float + assert type(sin(4)) == sin + assert type(polygamma(2.0, 4.0)) == Float + assert type(sin(Rational(1, 4))) == sin + + +def test_issue_5399(): + args = [x, y, S(2), S.Half] + + def ok(a): + """Return True if the input args for diff are ok""" + if not a: + return False + if a[0].is_Symbol is False: + return False + s_at = [i for i in range(len(a)) if a[i].is_Symbol] + n_at = [i for i in range(len(a)) if not a[i].is_Symbol] + # every symbol is followed by symbol or int + # every number is followed by a symbol + return (all(a[i + 1].is_Symbol or a[i + 1].is_Integer + for i in s_at if i + 1 < len(a)) and + all(a[i + 1].is_Symbol + for i in n_at if i + 1 < len(a))) + eq = x**10*y**8 + for a in subsets(args): + for v in variations(a, len(a)): + if ok(v): + eq.diff(*v) # does not raise + else: + raises(ValueError, lambda: eq.diff(*v)) + + +def test_derivative_numerically(): + z0 = x._random() + assert abs(Derivative(sin(x), x).doit_numerically(z0) - cos(z0)) < 1e-15 + + +def test_fdiff_argument_index_error(): + from sympy.core.function import ArgumentIndexError + + class myfunc(Function): + nargs = 1 # define since there is no eval routine + + def fdiff(self, idx): + raise ArgumentIndexError + mf = myfunc(x) + assert mf.diff(x) == Derivative(mf, x) + raises(TypeError, lambda: myfunc(x, x)) + + +def test_deriv_wrt_function(): + x = f(t) + xd = diff(x, t) + xdd = diff(xd, t) + y = g(t) + yd = diff(y, t) + + assert diff(x, t) == xd + assert diff(2 * x + 4, t) == 2 * xd + assert diff(2 * x + 4 + y, t) == 2 * xd + yd + assert diff(2 * x + 4 + y * x, t) == 2 * xd + x * yd + xd * y + assert diff(2 * x + 4 + y * x, x) == 2 + y + assert (diff(4 * x**2 + 3 * x + x * y, t) == 3 * xd + x * yd + xd * y + + 8 * x * xd) + assert (diff(4 * x**2 + 3 * xd + x * y, t) == 3 * xdd + x * yd + xd * y + + 8 * x * xd) + assert diff(4 * x**2 + 3 * xd + x * y, xd) == 3 + assert diff(4 * x**2 + 3 * xd + x * y, xdd) == 0 + assert diff(sin(x), t) == xd * cos(x) + assert diff(exp(x), t) == xd * exp(x) + assert diff(sqrt(x), t) == xd / (2 * sqrt(x)) + + +def test_diff_wrt_value(): + assert Expr()._diff_wrt is False + assert x._diff_wrt is True + assert f(x)._diff_wrt is True + assert Derivative(f(x), x)._diff_wrt is True + assert Derivative(x**2, x)._diff_wrt is False + + +def test_diff_wrt(): + fx = f(x) + dfx = diff(f(x), x) + ddfx = diff(f(x), x, x) + + assert diff(sin(fx) + fx**2, fx) == cos(fx) + 2*fx + assert diff(sin(dfx) + dfx**2, dfx) == cos(dfx) + 2*dfx + assert diff(sin(ddfx) + ddfx**2, ddfx) == cos(ddfx) + 2*ddfx + assert diff(fx**2, dfx) == 0 + assert diff(fx**2, ddfx) == 0 + assert diff(dfx**2, fx) == 0 + assert diff(dfx**2, ddfx) == 0 + assert diff(ddfx**2, dfx) == 0 + + assert diff(fx*dfx*ddfx, fx) == dfx*ddfx + assert diff(fx*dfx*ddfx, dfx) == fx*ddfx + assert diff(fx*dfx*ddfx, ddfx) == fx*dfx + + assert diff(f(x), x).diff(f(x)) == 0 + assert (sin(f(x)) - cos(diff(f(x), x))).diff(f(x)) == cos(f(x)) + + assert diff(sin(fx), fx, x) == diff(sin(fx), x, fx) + + # Chain rule cases + assert f(g(x)).diff(x) == \ + Derivative(g(x), x)*Derivative(f(g(x)), g(x)) + assert diff(f(g(x), h(y)), x) == \ + Derivative(g(x), x)*Derivative(f(g(x), h(y)), g(x)) + assert diff(f(g(x), h(x)), x) == ( + Derivative(f(g(x), h(x)), g(x))*Derivative(g(x), x) + + Derivative(f(g(x), h(x)), h(x))*Derivative(h(x), x)) + assert f( + sin(x)).diff(x) == cos(x)*Subs(Derivative(f(x), x), x, sin(x)) + + assert diff(f(g(x)), g(x)) == Derivative(f(g(x)), g(x)) + + +def test_diff_wrt_func_subs(): + assert f(g(x)).diff(x).subs(g, Lambda(x, 2*x)).doit() == f(2*x).diff(x) + + +def test_subs_in_derivative(): + expr = sin(x*exp(y)) + u = Function('u') + v = Function('v') + assert Derivative(expr, y).subs(expr, y) == Derivative(y, y) + assert Derivative(expr, y).subs(y, x).doit() == \ + Derivative(expr, y).doit().subs(y, x) + assert Derivative(f(x, y), y).subs(y, x) == Subs(Derivative(f(x, y), y), y, x) + assert Derivative(f(x, y), y).subs(x, y) == Subs(Derivative(f(x, y), y), x, y) + assert Derivative(f(x, y), y).subs(y, g(x, y)) == Subs(Derivative(f(x, y), y), y, g(x, y)).doit() + assert Derivative(f(x, y), y).subs(x, g(x, y)) == Subs(Derivative(f(x, y), y), x, g(x, y)) + assert Derivative(f(x, y), g(y)).subs(x, g(x, y)) == Derivative(f(g(x, y), y), g(y)) + assert Derivative(f(u(x), h(y)), h(y)).subs(h(y), g(x, y)) == \ + Subs(Derivative(f(u(x), h(y)), h(y)), h(y), g(x, y)).doit() + assert Derivative(f(x, y), y).subs(y, z) == Derivative(f(x, z), z) + assert Derivative(f(x, y), y).subs(y, g(y)) == Derivative(f(x, g(y)), g(y)) + assert Derivative(f(g(x), h(y)), h(y)).subs(h(y), u(y)) == \ + Derivative(f(g(x), u(y)), u(y)) + assert Derivative(f(x, f(x, x)), f(x, x)).subs( + f, Lambda((x, y), x + y)) == Subs( + Derivative(z + x, z), z, 2*x) + assert Subs(Derivative(f(f(x)), x), f, cos).doit() == sin(x)*sin(cos(x)) + assert Subs(Derivative(f(f(x)), f(x)), f, cos).doit() == -sin(cos(x)) + # Issue 13791. No comparison (it's a long formula) but this used to raise an exception. + assert isinstance(v(x, y, u(x, y)).diff(y).diff(x).diff(y), Expr) + # This is also related to issues 13791 and 13795; issue 15190 + F = Lambda((x, y), exp(2*x + 3*y)) + abstract = f(x, f(x, x)).diff(x, 2) + concrete = F(x, F(x, x)).diff(x, 2) + assert (abstract.subs(f, F).doit() - concrete).simplify() == 0 + # don't introduce a new symbol if not necessary + assert x in f(x).diff(x).subs(x, 0).atoms() + # case (4) + assert Derivative(f(x,f(x,y)), x, y).subs(x, g(y) + ) == Subs(Derivative(f(x, f(x, y)), x, y), x, g(y)) + + assert Derivative(f(x, x), x).subs(x, 0 + ) == Subs(Derivative(f(x, x), x), x, 0) + # issue 15194 + assert Derivative(f(y, g(x)), (x, z)).subs(z, x + ) == Derivative(f(y, g(x)), (x, x)) + + df = f(x).diff(x) + assert df.subs(df, 1) is S.One + assert df.diff(df) is S.One + dxy = Derivative(f(x, y), x, y) + dyx = Derivative(f(x, y), y, x) + assert dxy.subs(Derivative(f(x, y), y, x), 1) is S.One + assert dxy.diff(dyx) is S.One + assert Derivative(f(x, y), x, 2, y, 3).subs( + dyx, g(x, y)) == Derivative(g(x, y), x, 1, y, 2) + assert Derivative(f(x, x - y), y).subs(x, x + y) == Subs( + Derivative(f(x, x - y), y), x, x + y) + + +def test_diff_wrt_not_allowed(): + # issue 7027 included + for wrt in ( + cos(x), re(x), x**2, x*y, 1 + x, + Derivative(cos(x), x), Derivative(f(f(x)), x)): + raises(ValueError, lambda: diff(f(x), wrt)) + # if we don't differentiate wrt then don't raise error + assert diff(exp(x*y), x*y, 0) == exp(x*y) + + +def test_diff_wrt_intlike(): + class Two: + def __int__(self): + return 2 + + assert cos(x).diff(x, Two()) == -cos(x) + + +def test_klein_gordon_lagrangian(): + m = Symbol('m') + phi = f(x, t) + + L = -(diff(phi, t)**2 - diff(phi, x)**2 - m**2*phi**2)/2 + eqna = Eq( + diff(L, phi) - diff(L, diff(phi, x), x) - diff(L, diff(phi, t), t), 0) + eqnb = Eq(diff(phi, t, t) - diff(phi, x, x) + m**2*phi, 0) + assert eqna == eqnb + + +def test_sho_lagrangian(): + m = Symbol('m') + k = Symbol('k') + x = f(t) + + L = m*diff(x, t)**2/2 - k*x**2/2 + eqna = Eq(diff(L, x), diff(L, diff(x, t), t)) + eqnb = Eq(-k*x, m*diff(x, t, t)) + assert eqna == eqnb + + assert diff(L, x, t) == diff(L, t, x) + assert diff(L, diff(x, t), t) == m*diff(x, t, 2) + assert diff(L, t, diff(x, t)) == -k*x + m*diff(x, t, 2) + + +def test_straight_line(): + F = f(x) + Fd = F.diff(x) + L = sqrt(1 + Fd**2) + assert diff(L, F) == 0 + assert diff(L, Fd) == Fd/sqrt(1 + Fd**2) + + +def test_sort_variable(): + vsort = Derivative._sort_variable_count + def vsort0(*v, reverse=False): + return [i[0] for i in vsort([(i, 0) for i in ( + reversed(v) if reverse else v)])] + + for R in range(2): + assert vsort0(y, x, reverse=R) == [x, y] + assert vsort0(f(x), x, reverse=R) == [x, f(x)] + assert vsort0(f(y), f(x), reverse=R) == [f(x), f(y)] + assert vsort0(g(x), f(y), reverse=R) == [f(y), g(x)] + assert vsort0(f(x, y), f(x), reverse=R) == [f(x), f(x, y)] + fx = f(x).diff(x) + assert vsort0(fx, y, reverse=R) == [y, fx] + fy = f(y).diff(y) + assert vsort0(fy, fx, reverse=R) == [fx, fy] + fxx = fx.diff(x) + assert vsort0(fxx, fx, reverse=R) == [fx, fxx] + assert vsort0(Basic(x), f(x), reverse=R) == [f(x), Basic(x)] + assert vsort0(Basic(y), Basic(x), reverse=R) == [Basic(x), Basic(y)] + assert vsort0(Basic(y, z), Basic(x), reverse=R) == [ + Basic(x), Basic(y, z)] + assert vsort0(fx, x, reverse=R) == [ + x, fx] if R else [fx, x] + assert vsort0(Basic(x), x, reverse=R) == [ + x, Basic(x)] if R else [Basic(x), x] + assert vsort0(Basic(f(x)), f(x), reverse=R) == [ + f(x), Basic(f(x))] if R else [Basic(f(x)), f(x)] + assert vsort0(Basic(x, z), Basic(x), reverse=R) == [ + Basic(x), Basic(x, z)] if R else [Basic(x, z), Basic(x)] + assert vsort([]) == [] + assert _aresame(vsort([(x, 1)]), [Tuple(x, 1)]) + assert vsort([(x, y), (x, z)]) == [(x, y + z)] + assert vsort([(y, 1), (x, 1 + y)]) == [(x, 1 + y), (y, 1)] + # coverage complete; legacy tests below + assert vsort([(x, 3), (y, 2), (z, 1)]) == [(x, 3), (y, 2), (z, 1)] + assert vsort([(h(x), 1), (g(x), 1), (f(x), 1)]) == [ + (f(x), 1), (g(x), 1), (h(x), 1)] + assert vsort([(z, 1), (y, 2), (x, 3), (h(x), 1), (g(x), 1), + (f(x), 1)]) == [(x, 3), (y, 2), (z, 1), (f(x), 1), (g(x), 1), + (h(x), 1)] + assert vsort([(x, 1), (f(x), 1), (y, 1), (f(y), 1)]) == [(x, 1), + (y, 1), (f(x), 1), (f(y), 1)] + assert vsort([(y, 1), (x, 2), (g(x), 1), (f(x), 1), (z, 1), + (h(x), 1), (y, 2), (x, 1)]) == [(x, 3), (y, 3), (z, 1), + (f(x), 1), (g(x), 1), (h(x), 1)] + assert vsort([(z, 1), (y, 1), (f(x), 1), (x, 1), (f(x), 1), + (g(x), 1)]) == [(x, 1), (y, 1), (z, 1), (f(x), 2), (g(x), 1)] + assert vsort([(z, 1), (y, 2), (f(x), 1), (x, 2), (f(x), 2), + (g(x), 1), (z, 2), (z, 1), (y, 1), (x, 1)]) == [(x, 3), (y, 3), + (z, 4), (f(x), 3), (g(x), 1)] + assert vsort(((y, 2), (x, 1), (y, 1), (x, 1))) == [(x, 2), (y, 3)] + assert isinstance(vsort([(x, 3), (y, 2), (z, 1)])[0], Tuple) + assert vsort([(x, 1), (f(x), 1), (x, 1)]) == [(x, 2), (f(x), 1)] + assert vsort([(y, 2), (x, 3), (z, 1)]) == [(x, 3), (y, 2), (z, 1)] + assert vsort([(h(y), 1), (g(x), 1), (f(x), 1)]) == [ + (f(x), 1), (g(x), 1), (h(y), 1)] + assert vsort([(x, 1), (y, 1), (x, 1)]) == [(x, 2), (y, 1)] + assert vsort([(f(x), 1), (f(y), 1), (f(x), 1)]) == [ + (f(x), 2), (f(y), 1)] + dfx = f(x).diff(x) + self = [(dfx, 1), (x, 1)] + assert vsort(self) == self + assert vsort([ + (dfx, 1), (y, 1), (f(x), 1), (x, 1), (f(y), 1), (x, 1)]) == [ + (y, 1), (f(x), 1), (f(y), 1), (dfx, 1), (x, 2)] + dfy = f(y).diff(y) + assert vsort([(dfy, 1), (dfx, 1)]) == [(dfx, 1), (dfy, 1)] + d2fx = dfx.diff(x) + assert vsort([(d2fx, 1), (dfx, 1)]) == [(dfx, 1), (d2fx, 1)] + + +def test_multiple_derivative(): + # Issue #15007 + assert f(x, y).diff(y, y, x, y, x + ) == Derivative(f(x, y), (x, 2), (y, 3)) + + +def test_unhandled(): + class MyExpr(Expr): + def _eval_derivative(self, s): + if not s.name.startswith('xi'): + return self + else: + return None + + eq = MyExpr(f(x), y, z) + assert diff(eq, x, y, f(x), z) == Derivative(eq, f(x)) + assert diff(eq, f(x), x) == Derivative(eq, f(x)) + assert f(x, y).diff(x,(y, z)) == Derivative(f(x, y), x, (y, z)) + assert f(x, y).diff(x,(y, 0)) == Derivative(f(x, y), x) + + +def test_nfloat(): + from sympy.core.basic import _aresame + from sympy.polys.rootoftools import rootof + + x = Symbol("x") + eq = x**Rational(4, 3) + 4*x**(S.One/3)/3 + assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(S.One/3)) + assert _aresame(nfloat(eq, exponent=True), x**(4.0/3) + (4.0/3)*x**(1.0/3)) + eq = x**Rational(4, 3) + 4*x**(x/3)/3 + assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(x/3)) + big = 12345678901234567890 + # specify precision to match value used in nfloat + Float_big = Float(big, 15) + assert _aresame(nfloat(big), Float_big) + assert _aresame(nfloat(big*x), Float_big*x) + assert _aresame(nfloat(x**big, exponent=True), x**Float_big) + assert nfloat(cos(x + sqrt(2))) == cos(x + nfloat(sqrt(2))) + + # issue 6342 + f = S('x*lamda + lamda**3*(x/2 + 1/2) + lamda**2 + 1/4') + assert not any(a.free_symbols for a in solveset(f.subs(x, -0.139))) + + # issue 6632 + assert nfloat(-100000*sqrt(2500000001) + 5000000001) == \ + 9.99999999800000e-11 + + # issue 7122 + eq = cos(3*x**4 + y)*rootof(x**5 + 3*x**3 + 1, 0) + assert str(nfloat(eq, exponent=False, n=1)) == '-0.7*cos(3.0*x**4 + y)' + + # issue 10933 + for ti in (dict, Dict): + d = ti({S.Half: S.Half}) + n = nfloat(d) + assert isinstance(n, ti) + assert _aresame(list(n.items()).pop(), (S.Half, Float(.5))) + for ti in (dict, Dict): + d = ti({S.Half: S.Half}) + n = nfloat(d, dkeys=True) + assert isinstance(n, ti) + assert _aresame(list(n.items()).pop(), (Float(.5), Float(.5))) + d = [S.Half] + n = nfloat(d) + assert type(n) is list + assert _aresame(n[0], Float(.5)) + assert _aresame(nfloat(Eq(x, S.Half)).rhs, Float(.5)) + assert _aresame(nfloat(S(True)), S(True)) + assert _aresame(nfloat(Tuple(S.Half))[0], Float(.5)) + assert nfloat(Eq((3 - I)**2/2 + I, 0)) == S.false + # pass along kwargs + assert nfloat([{S.Half: x}], dkeys=True) == [{Float(0.5): x}] + + # Issue 17706 + A = MutableMatrix([[1, 2], [3, 4]]) + B = MutableMatrix( + [[Float('1.0', precision=53), Float('2.0', precision=53)], + [Float('3.0', precision=53), Float('4.0', precision=53)]]) + assert _aresame(nfloat(A), B) + A = ImmutableMatrix([[1, 2], [3, 4]]) + B = ImmutableMatrix( + [[Float('1.0', precision=53), Float('2.0', precision=53)], + [Float('3.0', precision=53), Float('4.0', precision=53)]]) + assert _aresame(nfloat(A), B) + + # issue 22524 + f = Function('f') + assert not nfloat(f(2)).atoms(Float) + + +def test_issue_7068(): + from sympy.abc import a, b + f = Function('f') + y1 = Dummy('y') + y2 = Dummy('y') + func1 = f(a + y1 * b) + func2 = f(a + y2 * b) + func1_y = func1.diff(y1) + func2_y = func2.diff(y2) + assert func1_y != func2_y + z1 = Subs(f(a), a, y1) + z2 = Subs(f(a), a, y2) + assert z1 != z2 + + +def test_issue_7231(): + from sympy.abc import a + ans1 = f(x).series(x, a) + res = (f(a) + (-a + x)*Subs(Derivative(f(y), y), y, a) + + (-a + x)**2*Subs(Derivative(f(y), y, y), y, a)/2 + + (-a + x)**3*Subs(Derivative(f(y), y, y, y), + y, a)/6 + + (-a + x)**4*Subs(Derivative(f(y), y, y, y, y), + y, a)/24 + + (-a + x)**5*Subs(Derivative(f(y), y, y, y, y, y), + y, a)/120 + O((-a + x)**6, (x, a))) + assert res == ans1 + ans2 = f(x).series(x, a) + assert res == ans2 + + +def test_issue_7687(): + from sympy.core.function import Function + from sympy.abc import x + f = Function('f')(x) + ff = Function('f')(x) + match_with_cache = ff.matches(f) + assert isinstance(f, type(ff)) + clear_cache() + ff = Function('f')(x) + assert isinstance(f, type(ff)) + assert match_with_cache == ff.matches(f) + + +def test_issue_7688(): + from sympy.core.function import Function, UndefinedFunction + + f = Function('f') # actually an UndefinedFunction + clear_cache() + class A(UndefinedFunction): + pass + a = A('f') + assert isinstance(a, type(f)) + + +def test_mexpand(): + from sympy.abc import x + assert _mexpand(None) is None + assert _mexpand(1) is S.One + assert _mexpand(x*(x + 1)**2) == (x*(x + 1)**2).expand() + + +def test_issue_8469(): + # This should not take forever to run + N = 40 + def g(w, theta): + return 1/(1+exp(w-theta)) + + ws = symbols(['w%i'%i for i in range(N)]) + import functools + expr = functools.reduce(g, ws) + assert isinstance(expr, Pow) + + +def test_issue_12996(): + # foo=True imitates the sort of arguments that Derivative can get + # from Integral when it passes doit to the expression + assert Derivative(im(x), x).doit(foo=True) == Derivative(im(x), x) + + +def test_should_evalf(): + # This should not take forever to run (see #8506) + assert isinstance(sin((1.0 + 1.0*I)**10000 + 1), sin) + + +def test_Derivative_as_finite_difference(): + # Central 1st derivative at gridpoint + x, h = symbols('x h', real=True) + dfdx = f(x).diff(x) + assert (dfdx.as_finite_difference([x-2, x-1, x, x+1, x+2]) - + (S.One/12*(f(x-2)-f(x+2)) + Rational(2, 3)*(f(x+1)-f(x-1)))).simplify() == 0 + + # Central 1st derivative "half-way" + assert (dfdx.as_finite_difference() - + (f(x + S.Half)-f(x - S.Half))).simplify() == 0 + assert (dfdx.as_finite_difference(h) - + (f(x + h/S(2))-f(x - h/S(2)))/h).simplify() == 0 + assert (dfdx.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (S(9)/(8*2*h)*(f(x+h) - f(x-h)) + + S.One/(24*2*h)*(f(x - 3*h) - f(x + 3*h)))).simplify() == 0 + + # One sided 1st derivative at gridpoint + assert (dfdx.as_finite_difference([0, 1, 2], 0) - + (Rational(-3, 2)*f(0) + 2*f(1) - f(2)/2)).simplify() == 0 + assert (dfdx.as_finite_difference([x, x+h], x) - + (f(x+h) - f(x))/h).simplify() == 0 + assert (dfdx.as_finite_difference([x-h, x, x+h], x-h) - + (-S(3)/(2*h)*f(x-h) + 2/h*f(x) - + S.One/(2*h)*f(x+h))).simplify() == 0 + + # One sided 1st derivative "half-way" + assert (dfdx.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h, x + 7*h]) + - 1/(2*h)*(-S(11)/(12)*f(x-h) + S(17)/(24)*f(x+h) + + Rational(3, 8)*f(x + 3*h) - Rational(5, 24)*f(x + 5*h) + + S.One/24*f(x + 7*h))).simplify() == 0 + + d2fdx2 = f(x).diff(x, 2) + # Central 2nd derivative at gridpoint + assert (d2fdx2.as_finite_difference([x-h, x, x+h]) - + h**-2 * (f(x-h) + f(x+h) - 2*f(x))).simplify() == 0 + + assert (d2fdx2.as_finite_difference([x - 2*h, x-h, x, x+h, x + 2*h]) - + h**-2 * (Rational(-1, 12)*(f(x - 2*h) + f(x + 2*h)) + + Rational(4, 3)*(f(x+h) + f(x-h)) - Rational(5, 2)*f(x))).simplify() == 0 + + # Central 2nd derivative "half-way" + assert (d2fdx2.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (2*h)**-2 * (S.Half*(f(x - 3*h) + f(x + 3*h)) - + S.Half*(f(x+h) + f(x-h)))).simplify() == 0 + + # One sided 2nd derivative at gridpoint + assert (d2fdx2.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) - + h**-2 * (2*f(x) - 5*f(x+h) + + 4*f(x+2*h) - f(x+3*h))).simplify() == 0 + + # One sided 2nd derivative at "half-way" + assert (d2fdx2.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) - + (2*h)**-2 * (Rational(3, 2)*f(x-h) - Rational(7, 2)*f(x+h) + Rational(5, 2)*f(x + 3*h) - + S.Half*f(x + 5*h))).simplify() == 0 + + d3fdx3 = f(x).diff(x, 3) + # Central 3rd derivative at gridpoint + assert (d3fdx3.as_finite_difference() - + (-f(x - Rational(3, 2)) + 3*f(x - S.Half) - + 3*f(x + S.Half) + f(x + Rational(3, 2)))).simplify() == 0 + + assert (d3fdx3.as_finite_difference( + [x - 3*h, x - 2*h, x-h, x, x+h, x + 2*h, x + 3*h]) - + h**-3 * (S.One/8*(f(x - 3*h) - f(x + 3*h)) - f(x - 2*h) + + f(x + 2*h) + Rational(13, 8)*(f(x-h) - f(x+h)))).simplify() == 0 + + # Central 3rd derivative at "half-way" + assert (d3fdx3.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (2*h)**-3 * (f(x + 3*h)-f(x - 3*h) + + 3*(f(x-h)-f(x+h)))).simplify() == 0 + + # One sided 3rd derivative at gridpoint + assert (d3fdx3.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) - + h**-3 * (f(x + 3*h)-f(x) + 3*(f(x+h)-f(x + 2*h)))).simplify() == 0 + + # One sided 3rd derivative at "half-way" + assert (d3fdx3.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) - + (2*h)**-3 * (f(x + 5*h)-f(x-h) + + 3*(f(x+h)-f(x + 3*h)))).simplify() == 0 + + # issue 11007 + y = Symbol('y', real=True) + d2fdxdy = f(x, y).diff(x, y) + + ref0 = Derivative(f(x + S.Half, y), y) - Derivative(f(x - S.Half, y), y) + assert (d2fdxdy.as_finite_difference(wrt=x) - ref0).simplify() == 0 + + half = S.Half + xm, xp, ym, yp = x-half, x+half, y-half, y+half + ref2 = f(xm, ym) + f(xp, yp) - f(xp, ym) - f(xm, yp) + assert (d2fdxdy.as_finite_difference() - ref2).simplify() == 0 + + +def test_issue_11159(): + # Tests Application._eval_subs + with _exp_is_pow(False): + expr1 = E + expr0 = expr1 * expr1 + expr1 = expr0.subs(expr1,expr0) + assert expr0 == expr1 + with _exp_is_pow(True): + expr1 = E + expr0 = expr1 * expr1 + expr2 = expr0.subs(expr1, expr0) + assert expr2 == E ** 4 + + +def test_issue_12005(): + e1 = Subs(Derivative(f(x), x), x, x) + assert e1.diff(x) == Derivative(f(x), x, x) + e2 = Subs(Derivative(f(x), x), x, x**2 + 1) + assert e2.diff(x) == 2*x*Subs(Derivative(f(x), x, x), x, x**2 + 1) + e3 = Subs(Derivative(f(x) + y**2 - y, y), y, y**2) + assert e3.diff(y) == 4*y + e4 = Subs(Derivative(f(x + y), y), y, (x**2)) + assert e4.diff(y) is S.Zero + e5 = Subs(Derivative(f(x), x), (y, z), (y, z)) + assert e5.diff(x) == Derivative(f(x), x, x) + assert f(g(x)).diff(g(x), g(x)) == Derivative(f(g(x)), g(x), g(x)) + + +def test_issue_13843(): + x = symbols('x') + f = Function('f') + m, n = symbols('m n', integer=True) + assert Derivative(Derivative(f(x), (x, m)), (x, n)) == Derivative(f(x), (x, m + n)) + assert Derivative(Derivative(f(x), (x, m+5)), (x, n+3)) == Derivative(f(x), (x, m + n + 8)) + + assert Derivative(f(x), (x, n)).doit() == Derivative(f(x), (x, n)) + + +def test_order_could_be_zero(): + x, y = symbols('x, y') + n = symbols('n', integer=True, nonnegative=True) + m = symbols('m', integer=True, positive=True) + assert diff(y, (x, n)) == Piecewise((y, Eq(n, 0)), (0, True)) + assert diff(y, (x, n + 1)) is S.Zero + assert diff(y, (x, m)) is S.Zero + + +def test_undefined_function_eq(): + f = Function('f') + f2 = Function('f') + g = Function('g') + f_real = Function('f', is_real=True) + + # This test may only be meaningful if the cache is turned off + assert f == f2 + assert hash(f) == hash(f2) + assert f == f + + assert f != g + + assert f != f_real + + +def test_function_assumptions(): + x = Symbol('x') + f = Function('f') + f_real = Function('f', real=True) + f_real1 = Function('f', real=1) + f_real_inherit = Function(Symbol('f', real=True)) + + assert f_real == f_real1 # assumptions are sanitized + assert f != f_real + assert f(x) != f_real(x) + + assert f(x).is_real is None + assert f_real(x).is_real is True + assert f_real_inherit(x).is_real is True and f_real_inherit.name == 'f' + + # Can also do it this way, but it won't be equal to f_real because of the + # way UndefinedFunction.__new__ works. Any non-recognized assumptions + # are just added literally as something which is used in the hash + f_real2 = Function('f', is_real=True) + assert f_real2(x).is_real is True + + +def test_undef_fcn_float_issue_6938(): + f = Function('ceil') + assert not f(0.3).is_number + f = Function('sin') + assert not f(0.3).is_number + assert not f(pi).evalf().is_number + x = Symbol('x') + assert not f(x).evalf(subs={x:1.2}).is_number + + +def test_undefined_function_eval(): + # Issue 15170. Make sure UndefinedFunction with eval defined works + # properly. + + fdiff = lambda self, argindex=1: cos(self.args[argindex - 1]) + eval = classmethod(lambda cls, t: None) + _imp_ = classmethod(lambda cls, t: sin(t)) + + temp = Function('temp', fdiff=fdiff, eval=eval, _imp_=_imp_) + + expr = temp(t) + assert sympify(expr) == expr + assert type(sympify(expr)).fdiff.__name__ == "" + assert expr.diff(t) == cos(t) + + +def test_issue_15241(): + F = f(x) + Fx = F.diff(x) + assert (F + x*Fx).diff(x, Fx) == 2 + assert (F + x*Fx).diff(Fx, x) == 1 + assert (x*F + x*Fx*F).diff(F, x) == x*Fx.diff(x) + Fx + 1 + assert (x*F + x*Fx*F).diff(x, F) == x*Fx.diff(x) + Fx + 1 + y = f(x) + G = f(y) + Gy = G.diff(y) + assert (G + y*Gy).diff(y, Gy) == 2 + assert (G + y*Gy).diff(Gy, y) == 1 + assert (y*G + y*Gy*G).diff(G, y) == y*Gy.diff(y) + Gy + 1 + assert (y*G + y*Gy*G).diff(y, G) == y*Gy.diff(y) + Gy + 1 + + +def test_issue_15226(): + assert Subs(Derivative(f(y), x, y), y, g(x)).doit() != 0 + + +def test_issue_7027(): + for wrt in (cos(x), re(x), Derivative(cos(x), x)): + raises(ValueError, lambda: diff(f(x), wrt)) + + +def test_derivative_quick_exit(): + assert f(x).diff(y) == 0 + assert f(x).diff(y, f(x)) == 0 + assert f(x).diff(x, f(y)) == 0 + assert f(f(x)).diff(x, f(x), f(y)) == 0 + assert f(f(x)).diff(x, f(x), y) == 0 + assert f(x).diff(g(x)) == 0 + assert f(x).diff(x, f(x).diff(x)) == 1 + df = f(x).diff(x) + assert f(x).diff(df) == 0 + dg = g(x).diff(x) + assert dg.diff(df).doit() == 0 + + +def test_issue_15084_13166(): + eq = f(x, g(x)) + assert eq.diff((g(x), y)) == Derivative(f(x, g(x)), (g(x), y)) + # issue 13166 + assert eq.diff(x, 2).doit() == ( + (Derivative(f(x, g(x)), (g(x), 2))*Derivative(g(x), x) + + Subs(Derivative(f(x, _xi_2), _xi_2, x), _xi_2, g(x)))*Derivative(g(x), + x) + Derivative(f(x, g(x)), g(x))*Derivative(g(x), (x, 2)) + + Derivative(g(x), x)*Subs(Derivative(f(_xi_1, g(x)), _xi_1, g(x)), + _xi_1, x) + Subs(Derivative(f(_xi_1, g(x)), (_xi_1, 2)), _xi_1, x)) + # issue 6681 + assert diff(f(x, t, g(x, t)), x).doit() == ( + Derivative(f(x, t, g(x, t)), g(x, t))*Derivative(g(x, t), x) + + Subs(Derivative(f(_xi_1, t, g(x, t)), _xi_1), _xi_1, x)) + # make sure the order doesn't matter when using diff + assert eq.diff(x, g(x)) == eq.diff(g(x), x) + + +def test_negative_counts(): + # issue 13873 + raises(ValueError, lambda: sin(x).diff(x, -1)) + + +def test_Derivative__new__(): + raises(TypeError, lambda: f(x).diff((x, 2), 0)) + assert f(x, y).diff([(x, y), 0]) == f(x, y) + assert f(x, y).diff([(x, y), 1]) == NDimArray([ + Derivative(f(x, y), x), Derivative(f(x, y), y)]) + assert f(x,y).diff(y, (x, z), y, x) == Derivative( + f(x, y), (x, z + 1), (y, 2)) + assert Matrix([x]).diff(x, 2) == Matrix([0]) # is_zero exit + + +def test_issue_14719_10150(): + class V(Expr): + _diff_wrt = True + is_scalar = False + assert V().diff(V()) == Derivative(V(), V()) + assert (2*V()).diff(V()) == 2*Derivative(V(), V()) + class X(Expr): + _diff_wrt = True + assert X().diff(X()) == 1 + assert (2*X()).diff(X()) == 2 + + +def test_noncommutative_issue_15131(): + x = Symbol('x', commutative=False) + t = Symbol('t', commutative=False) + fx = Function('Fx', commutative=False)(x) + ft = Function('Ft', commutative=False)(t) + A = Symbol('A', commutative=False) + eq = fx * A * ft + eqdt = eq.diff(t) + assert eqdt.args[-1] == ft.diff(t) + + +def test_Subs_Derivative(): + a = Derivative(f(g(x), h(x)), g(x), h(x),x) + b = Derivative(Derivative(f(g(x), h(x)), g(x), h(x)),x) + c = f(g(x), h(x)).diff(g(x), h(x), x) + d = f(g(x), h(x)).diff(g(x), h(x)).diff(x) + e = Derivative(f(g(x), h(x)), x) + eqs = (a, b, c, d, e) + subs = lambda arg: arg.subs(f, Lambda((x, y), exp(x + y)) + ).subs(g(x), 1/x).subs(h(x), x**3) + ans = 3*x**2*exp(1/x)*exp(x**3) - exp(1/x)*exp(x**3)/x**2 + assert all(subs(i).doit().expand() == ans for i in eqs) + assert all(subs(i.doit()).doit().expand() == ans for i in eqs) + +def test_issue_15360(): + f = Function('f') + assert f.name == 'f' + + +def test_issue_15947(): + assert f._diff_wrt is False + raises(TypeError, lambda: f(f)) + raises(TypeError, lambda: f(x).diff(f)) + + +def test_Derivative_free_symbols(): + f = Function('f') + n = Symbol('n', integer=True, positive=True) + assert diff(f(x), (x, n)).free_symbols == {n, x} + + +def test_issue_20683(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + y = Derivative(z, x).subs(x,0) + assert y.doit() == 0 + y = Derivative(8, x).subs(x,0) + assert y.doit() == 0 + + +def test_issue_10503(): + f = exp(x**3)*cos(x**6) + assert f.series(x, 0, 14) == 1 + x**3 + x**6/2 + x**9/6 - 11*x**12/24 + O(x**14) + + +def test_issue_17382(): + # copied from sympy/core/tests/test_evalf.py + def NS(e, n=15, **options): + return sstr(sympify(e).evalf(n, **options), full_prec=True) + + x = Symbol('x') + expr = solveset(2 * cos(x) * cos(2 * x) - 1, x, S.Reals) + expected = "Union(" \ + "ImageSet(Lambda(_n, 6.28318530717959*_n + 5.79812359592087), Integers), " \ + "ImageSet(Lambda(_n, 6.28318530717959*_n + 0.485061711258717), Integers))" + assert NS(expr) == expected + +def test_eval_sympified(): + # Check both arguments and return types from eval are sympified + + class F(Function): + @classmethod + def eval(cls, x): + assert x is S.One + return 1 + + assert F(1) is S.One + + # String arguments are not allowed + class F2(Function): + @classmethod + def eval(cls, x): + if x == 0: + return '1' + + raises(SympifyError, lambda: F2(0)) + F2(1) # Doesn't raise + + # TODO: Disable string inputs (https://github.com/sympy/sympy/issues/11003) + # raises(SympifyError, lambda: F2('2')) + +def test_eval_classmethod_check(): + with raises(TypeError): + class F(Function): + def eval(self, x): + pass + + +def test_issue_27163(): + # https://github.com/sympy/sympy/issues/27163 + raises(TypeError, lambda: Derivative(f, t)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_kind.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_kind.py new file mode 100644 index 0000000000000000000000000000000000000000..cbfdffb9304b49488756752ca198fd4067087437 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_kind.py @@ -0,0 +1,57 @@ +from sympy.core.add import Add +from sympy.core.kind import NumberKind, UndefinedKind +from sympy.core.mul import Mul +from sympy.core.numbers import pi, zoo, I, AlgebraicNumber +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.integrals.integrals import Integral +from sympy.core.function import Derivative +from sympy.matrices import (Matrix, SparseMatrix, ImmutableMatrix, + ImmutableSparseMatrix, MatrixSymbol, MatrixKind, MatMul) + +comm_x = Symbol('x') +noncomm_x = Symbol('x', commutative=False) + +def test_NumberKind(): + assert S.One.kind is NumberKind + assert pi.kind is NumberKind + assert S.NaN.kind is NumberKind + assert zoo.kind is NumberKind + assert I.kind is NumberKind + assert AlgebraicNumber(1).kind is NumberKind + +def test_Add_kind(): + assert Add(2, 3, evaluate=False).kind is NumberKind + assert Add(2,comm_x).kind is NumberKind + assert Add(2,noncomm_x).kind is UndefinedKind + +def test_mul_kind(): + assert Mul(2,comm_x, evaluate=False).kind is NumberKind + assert Mul(2,3, evaluate=False).kind is NumberKind + assert Mul(noncomm_x,2, evaluate=False).kind is UndefinedKind + assert Mul(2,noncomm_x, evaluate=False).kind is UndefinedKind + +def test_Symbol_kind(): + assert comm_x.kind is NumberKind + assert noncomm_x.kind is UndefinedKind + +def test_Integral_kind(): + A = MatrixSymbol('A', 2,2) + assert Integral(comm_x, comm_x).kind is NumberKind + assert Integral(A, comm_x).kind is MatrixKind(NumberKind) + +def test_Derivative_kind(): + A = MatrixSymbol('A', 2,2) + assert Derivative(comm_x, comm_x).kind is NumberKind + assert Derivative(A, comm_x).kind is MatrixKind(NumberKind) + +def test_Matrix_kind(): + classes = (Matrix, SparseMatrix, ImmutableMatrix, ImmutableSparseMatrix) + for cls in classes: + m = cls.zeros(3, 2) + assert m.kind is MatrixKind(NumberKind) + +def test_MatMul_kind(): + M = Matrix([[1,2],[3,4]]) + assert MatMul(2, M).kind is MatrixKind(NumberKind) + assert MatMul(comm_x, M).kind is MatrixKind(NumberKind) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_logic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_logic.py new file mode 100644 index 0000000000000000000000000000000000000000..df5647f32ea7c4e326eb4e3aec6a7b2987f32aee --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_logic.py @@ -0,0 +1,198 @@ +from sympy.core.logic import (fuzzy_not, Logic, And, Or, Not, fuzzy_and, + fuzzy_or, _fuzzy_group, _torf, fuzzy_nand, fuzzy_xor) +from sympy.testing.pytest import raises + +from itertools import product + +T = True +F = False +U = None + + + +def test_torf(): + v = [T, F, U] + for i in product(*[v]*3): + assert _torf(i) is (True if all(j for j in i) else + (False if all(j is False for j in i) else None)) + + +def test_fuzzy_group(): + v = [T, F, U] + for i in product(*[v]*3): + assert _fuzzy_group(i) is (None if None in i else + (True if all(j for j in i) else False)) + assert _fuzzy_group(i, quick_exit=True) is \ + (None if (i.count(False) > 1) else + (None if None in i else (True if all(j for j in i) else False))) + it = (True if (i == 0) else None for i in range(2)) + assert _torf(it) is None + it = (True if (i == 1) else None for i in range(2)) + assert _torf(it) is None + + +def test_fuzzy_not(): + assert fuzzy_not(T) == F + assert fuzzy_not(F) == T + assert fuzzy_not(U) == U + + +def test_fuzzy_and(): + assert fuzzy_and([T, T]) == T + assert fuzzy_and([T, F]) == F + assert fuzzy_and([T, U]) == U + assert fuzzy_and([F, F]) == F + assert fuzzy_and([F, U]) == F + assert fuzzy_and([U, U]) == U + assert [fuzzy_and([w]) for w in [U, T, F]] == [U, T, F] + assert fuzzy_and([T, F, U]) == F + assert fuzzy_and([]) == T + raises(TypeError, lambda: fuzzy_and()) + + +def test_fuzzy_or(): + assert fuzzy_or([T, T]) == T + assert fuzzy_or([T, F]) == T + assert fuzzy_or([T, U]) == T + assert fuzzy_or([F, F]) == F + assert fuzzy_or([F, U]) == U + assert fuzzy_or([U, U]) == U + assert [fuzzy_or([w]) for w in [U, T, F]] == [U, T, F] + assert fuzzy_or([T, F, U]) == T + assert fuzzy_or([]) == F + raises(TypeError, lambda: fuzzy_or()) + + +def test_logic_cmp(): + l1 = And('a', Not('b')) + l2 = And('a', Not('b')) + + assert hash(l1) == hash(l2) + assert (l1 == l2) == T + assert (l1 != l2) == F + + assert And('a', 'b', 'c') == And('b', 'a', 'c') + assert And('a', 'b', 'c') == And('c', 'b', 'a') + assert And('a', 'b', 'c') == And('c', 'a', 'b') + + assert Not('a') < Not('b') + assert (Not('b') < Not('a')) is False + assert (Not('a') < 2) is False + + +def test_logic_onearg(): + assert And() is True + assert Or() is False + + assert And(T) == T + assert And(F) == F + assert Or(T) == T + assert Or(F) == F + + assert And('a') == 'a' + assert Or('a') == 'a' + + +def test_logic_xnotx(): + assert And('a', Not('a')) == F + assert Or('a', Not('a')) == T + + +def test_logic_eval_TF(): + assert And(F, F) == F + assert And(F, T) == F + assert And(T, F) == F + assert And(T, T) == T + + assert Or(F, F) == F + assert Or(F, T) == T + assert Or(T, F) == T + assert Or(T, T) == T + + assert And('a', T) == 'a' + assert And('a', F) == F + assert Or('a', T) == T + assert Or('a', F) == 'a' + + +def test_logic_combine_args(): + assert And('a', 'b', 'a') == And('a', 'b') + assert Or('a', 'b', 'a') == Or('a', 'b') + + assert And(And('a', 'b'), And('c', 'd')) == And('a', 'b', 'c', 'd') + assert Or(Or('a', 'b'), Or('c', 'd')) == Or('a', 'b', 'c', 'd') + + assert Or('t', And('n', 'p', 'r'), And('n', 'r'), And('n', 'p', 'r'), 't', + And('n', 'r')) == Or('t', And('n', 'p', 'r'), And('n', 'r')) + + +def test_logic_expand(): + t = And(Or('a', 'b'), 'c') + assert t.expand() == Or(And('a', 'c'), And('b', 'c')) + + t = And(Or('a', Not('b')), 'b') + assert t.expand() == And('a', 'b') + + t = And(Or('a', 'b'), Or('c', 'd')) + assert t.expand() == \ + Or(And('a', 'c'), And('a', 'd'), And('b', 'c'), And('b', 'd')) + + +def test_logic_fromstring(): + S = Logic.fromstring + + assert S('a') == 'a' + assert S('!a') == Not('a') + assert S('a & b') == And('a', 'b') + assert S('a | b') == Or('a', 'b') + assert S('a | b & c') == And(Or('a', 'b'), 'c') + assert S('a & b | c') == Or(And('a', 'b'), 'c') + assert S('a & b & c') == And('a', 'b', 'c') + assert S('a | b | c') == Or('a', 'b', 'c') + + raises(ValueError, lambda: S('| a')) + raises(ValueError, lambda: S('& a')) + raises(ValueError, lambda: S('a | | b')) + raises(ValueError, lambda: S('a | & b')) + raises(ValueError, lambda: S('a & & b')) + raises(ValueError, lambda: S('a |')) + raises(ValueError, lambda: S('a|b')) + raises(ValueError, lambda: S('!')) + raises(ValueError, lambda: S('! a')) + raises(ValueError, lambda: S('!(a + 1)')) + raises(ValueError, lambda: S('')) + + +def test_logic_not(): + assert Not('a') != '!a' + assert Not('!a') != 'a' + assert Not(True) == False + assert Not(False) == True + + # NOTE: we may want to change default Not behaviour and put this + # functionality into some method. + assert Not(And('a', 'b')) == Or(Not('a'), Not('b')) + assert Not(Or('a', 'b')) == And(Not('a'), Not('b')) + + raises(ValueError, lambda: Not(1)) + + +def test_formatting(): + S = Logic.fromstring + raises(ValueError, lambda: S('a&b')) + raises(ValueError, lambda: S('a|b')) + raises(ValueError, lambda: S('! a')) + + +def test_fuzzy_xor(): + assert fuzzy_xor((None,)) is None + assert fuzzy_xor((None, True)) is None + assert fuzzy_xor((None, False)) is None + assert fuzzy_xor((True, False)) is True + assert fuzzy_xor((True, True)) is False + assert fuzzy_xor((True, True, False)) is False + assert fuzzy_xor((True, True, False, True)) is True + +def test_fuzzy_nand(): + for args in [(1, 0), (1, 1), (0, 0)]: + assert fuzzy_nand(args) == fuzzy_not(fuzzy_and(args)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_match.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_match.py new file mode 100644 index 0000000000000000000000000000000000000000..b44012bebc4a5f3ec413c236dca1dec71da78cf5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_match.py @@ -0,0 +1,766 @@ +from sympy import abc +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.hyper import meijerg +from sympy.polys.polytools import Poly +from sympy.simplify.radsimp import collect +from sympy.simplify.simplify import signsimp + +from sympy.testing.pytest import XFAIL + + +def test_symbol(): + x = Symbol('x') + a, b, c, p, q = map(Wild, 'abcpq') + + e = x + assert e.match(x) == {} + assert e.matches(x) == {} + assert e.match(a) == {a: x} + + e = Rational(5) + assert e.match(c) == {c: 5} + assert e.match(e) == {} + assert e.match(e + 1) is None + + +def test_add(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q, r = map(Wild, 'pqr') + + e = a + b + assert e.match(p + b) == {p: a} + assert e.match(p + a) == {p: b} + + e = 1 + b + assert e.match(p + b) == {p: 1} + + e = a + b + c + assert e.match(a + p + c) == {p: b} + assert e.match(b + p + c) == {p: a} + + e = a + b + c + x + assert e.match(a + p + x + c) == {p: b} + assert e.match(b + p + c + x) == {p: a} + assert e.match(b) is None + assert e.match(b + p) == {p: a + c + x} + assert e.match(a + p + c) == {p: b + x} + assert e.match(b + p + c) == {p: a + x} + + e = 4*x + 5 + assert e.match(4*x + p) == {p: 5} + assert e.match(3*x + p) == {p: x + 5} + assert e.match(p*x + 5) == {p: 4} + + +def test_power(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q, r = map(Wild, 'pqr') + + e = (x + y)**a + assert e.match(p**q) == {p: x + y, q: a} + assert e.match(p**p) is None + + e = (x + y)**(x + y) + assert e.match(p**p) == {p: x + y} + assert e.match(p**q) == {p: x + y, q: x + y} + + e = (2*x)**2 + assert e.match(p*q**r) == {p: 4, q: x, r: 2} + + e = Integer(1) + assert e.match(x**p) == {p: 0} + + +def test_match_exclude(): + x = Symbol('x') + y = Symbol('y') + p = Wild("p") + q = Wild("q") + r = Wild("r") + + e = Rational(6) + assert e.match(2*p) == {p: 3} + + e = 3/(4*x + 5) + assert e.match(3/(p*x + q)) == {p: 4, q: 5} + + e = 3/(4*x + 5) + assert e.match(p/(q*x + r)) == {p: 3, q: 4, r: 5} + + e = 2/(x + 1) + assert e.match(p/(q*x + r)) == {p: 2, q: 1, r: 1} + + e = 1/(x + 1) + assert e.match(p/(q*x + r)) == {p: 1, q: 1, r: 1} + + e = 4*x + 5 + assert e.match(p*x + q) == {p: 4, q: 5} + + e = 4*x + 5*y + 6 + assert e.match(p*x + q*y + r) == {p: 4, q: 5, r: 6} + + a = Wild('a', exclude=[x]) + + e = 3*x + assert e.match(p*x) == {p: 3} + assert e.match(a*x) == {a: 3} + + e = 3*x**2 + assert e.match(p*x) == {p: 3*x} + assert e.match(a*x) is None + + e = 3*x + 3 + 6/x + assert e.match(p*x**2 + p*x + 2*p) == {p: 3/x} + assert e.match(a*x**2 + a*x + 2*a) is None + + +def test_mul(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q = map(Wild, 'pq') + + e = 4*x + assert e.match(p*x) == {p: 4} + assert e.match(p*y) is None + assert e.match(e + p*y) == {p: 0} + + e = a*x*b*c + assert e.match(p*x) == {p: a*b*c} + assert e.match(c*p*x) == {p: a*b} + + e = (a + b)*(a + c) + assert e.match((p + b)*(p + c)) == {p: a} + + e = x + assert e.match(p*x) == {p: 1} + + e = exp(x) + assert e.match(x**p*exp(x*q)) == {p: 0, q: 1} + + e = I*Poly(x, x) + assert e.match(I*p) == {p: x} + + +def test_mul_noncommutative(): + x, y = symbols('x y') + A, B, C = symbols('A B C', commutative=False) + u, v = symbols('u v', cls=Wild) + w, z = symbols('w z', cls=Wild, commutative=False) + + assert (u*v).matches(x) in ({v: x, u: 1}, {u: x, v: 1}) + assert (u*v).matches(x*y) in ({v: y, u: x}, {u: y, v: x}) + assert (u*v).matches(A) is None + assert (u*v).matches(A*B) is None + assert (u*v).matches(x*A) is None + assert (u*v).matches(x*y*A) is None + assert (u*v).matches(x*A*B) is None + assert (u*v).matches(x*y*A*B) is None + + assert (v*w).matches(x) is None + assert (v*w).matches(x*y) is None + assert (v*w).matches(A) == {w: A, v: 1} + assert (v*w).matches(A*B) == {w: A*B, v: 1} + assert (v*w).matches(x*A) == {w: A, v: x} + assert (v*w).matches(x*y*A) == {w: A, v: x*y} + assert (v*w).matches(x*A*B) == {w: A*B, v: x} + assert (v*w).matches(x*y*A*B) == {w: A*B, v: x*y} + + assert (v*w).matches(-x) is None + assert (v*w).matches(-x*y) is None + assert (v*w).matches(-A) == {w: A, v: -1} + assert (v*w).matches(-A*B) == {w: A*B, v: -1} + assert (v*w).matches(-x*A) == {w: A, v: -x} + assert (v*w).matches(-x*y*A) == {w: A, v: -x*y} + assert (v*w).matches(-x*A*B) == {w: A*B, v: -x} + assert (v*w).matches(-x*y*A*B) == {w: A*B, v: -x*y} + + assert (w*z).matches(x) is None + assert (w*z).matches(x*y) is None + assert (w*z).matches(A) is None + assert (w*z).matches(A*B) == {w: A, z: B} + assert (w*z).matches(B*A) == {w: B, z: A} + assert (w*z).matches(A*B*C) in [{w: A, z: B*C}, {w: A*B, z: C}] + assert (w*z).matches(x*A) is None + assert (w*z).matches(x*y*A) is None + assert (w*z).matches(x*A*B) is None + assert (w*z).matches(x*y*A*B) is None + + assert (w*A).matches(A) is None + assert (A*w*B).matches(A*B) is None + + assert (u*w*z).matches(x) is None + assert (u*w*z).matches(x*y) is None + assert (u*w*z).matches(A) is None + assert (u*w*z).matches(A*B) == {u: 1, w: A, z: B} + assert (u*w*z).matches(B*A) == {u: 1, w: B, z: A} + assert (u*w*z).matches(x*A) is None + assert (u*w*z).matches(x*y*A) is None + assert (u*w*z).matches(x*A*B) == {u: x, w: A, z: B} + assert (u*w*z).matches(x*B*A) == {u: x, w: B, z: A} + assert (u*w*z).matches(x*y*A*B) == {u: x*y, w: A, z: B} + assert (u*w*z).matches(x*y*B*A) == {u: x*y, w: B, z: A} + + assert (u*A).matches(x*A) == {u: x} + assert (u*A).matches(x*A*B) is None + assert (u*B).matches(x*A) is None + assert (u*A*B).matches(x*A*B) == {u: x} + assert (u*A*B).matches(x*B*A) is None + assert (u*A*B).matches(x*A) is None + + assert (u*w*A).matches(x*A*B) is None + assert (u*w*B).matches(x*A*B) == {u: x, w: A} + + assert (u*v*A*B).matches(x*A*B) in [{u: x, v: 1}, {v: x, u: 1}] + assert (u*v*A*B).matches(x*B*A) is None + assert (u*v*A*B).matches(u*v*A*C) is None + + +def test_mul_noncommutative_mismatch(): + A, B, C = symbols('A B C', commutative=False) + w = symbols('w', cls=Wild, commutative=False) + + assert (w*B*w).matches(A*B*A) == {w: A} + assert (w*B*w).matches(A*C*B*A*C) == {w: A*C} + assert (w*B*w).matches(A*C*B*A*B) is None + assert (w*B*w).matches(A*B*C) is None + assert (w*w*C).matches(A*B*C) is None + + +def test_mul_noncommutative_pow(): + A, B, C = symbols('A B C', commutative=False) + w = symbols('w', cls=Wild, commutative=False) + + assert (A*B*w).matches(A*B**2) == {w: B} + assert (A*(B**2)*w*(B**3)).matches(A*B**8) == {w: B**3} + assert (A*B*w*C).matches(A*(B**4)*C) == {w: B**3} + + assert (A*B*(w**(-1))).matches(A*B*(C**(-1))) == {w: C} + assert (A*(B*w)**(-1)*C).matches(A*(B*C)**(-1)*C) == {w: C} + + assert ((w**2)*B*C).matches((A**2)*B*C) == {w: A} + assert ((w**2)*B*(w**3)).matches((A**2)*B*(A**3)) == {w: A} + assert ((w**2)*B*(w**4)).matches((A**2)*B*(A**2)) is None + +def test_complex(): + a, b, c = map(Symbol, 'abc') + x, y = map(Wild, 'xy') + + assert (1 + I).match(x + I) == {x: 1} + assert (a + I).match(x + I) == {x: a} + assert (2*I).match(x*I) == {x: 2} + assert (a*I).match(x*I) == {x: a} + assert (a*I).match(x*y) == {x: I, y: a} + assert (2*I).match(x*y) == {x: 2, y: I} + assert (a + b*I).match(x + y*I) == {x: a, y: b} + + +def test_functions(): + from sympy.core.function import WildFunction + x = Symbol('x') + g = WildFunction('g') + p = Wild('p') + q = Wild('q') + + f = cos(5*x) + notf = x + assert f.match(p*cos(q*x)) == {p: 1, q: 5} + assert f.match(p*g) == {p: 1, g: cos(5*x)} + assert notf.match(g) is None + + +@XFAIL +def test_functions_X1(): + from sympy.core.function import WildFunction + x = Symbol('x') + g = WildFunction('g') + p = Wild('p') + q = Wild('q') + + f = cos(5*x) + assert f.match(p*g(q*x)) == {p: 1, g: cos, q: 5} + + +def test_interface(): + x, y = map(Symbol, 'xy') + p, q = map(Wild, 'pq') + + assert (x + 1).match(p + 1) == {p: x} + assert (x*3).match(p*3) == {p: x} + assert (x**3).match(p**3) == {p: x} + assert (x*cos(y)).match(p*cos(q)) == {p: x, q: y} + + assert (x*y).match(p*q) in [{p:x, q:y}, {p:y, q:x}] + assert (x + y).match(p + q) in [{p:x, q:y}, {p:y, q:x}] + assert (x*y + 1).match(p*q) in [{p:1, q:1 + x*y}, {p:1 + x*y, q:1}] + + +def test_derivative1(): + x, y = map(Symbol, 'xy') + p, q = map(Wild, 'pq') + + f = Function('f', nargs=1) + fd = Derivative(f(x), x) + + assert fd.match(p) == {p: fd} + assert (fd + 1).match(p + 1) == {p: fd} + assert (fd).match(fd) == {} + assert (3*fd).match(p*fd) is not None + assert (3*fd - 1).match(p*fd + q) == {p: 3, q: -1} + + +def test_derivative_bug1(): + f = Function("f") + x = Symbol("x") + a = Wild("a", exclude=[f, x]) + b = Wild("b", exclude=[f]) + pattern = a * Derivative(f(x), x, x) + b + expr = Derivative(f(x), x) + x**2 + d1 = {b: x**2} + d2 = pattern.xreplace(d1).matches(expr, d1) + assert d2 is None + + +def test_derivative2(): + f = Function("f") + x = Symbol("x") + a = Wild("a", exclude=[f, x]) + b = Wild("b", exclude=[f]) + e = Derivative(f(x), x) + assert e.match(Derivative(f(x), x)) == {} + assert e.match(Derivative(f(x), x, x)) is None + e = Derivative(f(x), x, x) + assert e.match(Derivative(f(x), x)) is None + assert e.match(Derivative(f(x), x, x)) == {} + e = Derivative(f(x), x) + x**2 + assert e.match(a*Derivative(f(x), x) + b) == {a: 1, b: x**2} + assert e.match(a*Derivative(f(x), x, x) + b) is None + e = Derivative(f(x), x, x) + x**2 + assert e.match(a*Derivative(f(x), x) + b) is None + assert e.match(a*Derivative(f(x), x, x) + b) == {a: 1, b: x**2} + + +def test_match_deriv_bug1(): + n = Function('n') + l = Function('l') + + x = Symbol('x') + p = Wild('p') + + e = diff(l(x), x)/x - diff(diff(n(x), x), x)/2 - \ + diff(n(x), x)**2/4 + diff(n(x), x)*diff(l(x), x)/4 + e = e.subs(n(x), -l(x)).doit() + t = x*exp(-l(x)) + t2 = t.diff(x, x)/t + assert e.match( (p*t2).expand() ) == {p: Rational(-1, 2)} + + +def test_match_bug2(): + x, y = map(Symbol, 'xy') + p, q, r = map(Wild, 'pqr') + res = (x + y).match(p + q + r) + assert (p + q + r).subs(res) == x + y + + +def test_match_bug3(): + x, a, b = map(Symbol, 'xab') + p = Wild('p') + assert (b*x*exp(a*x)).match(x*exp(p*x)) is None + + +def test_match_bug4(): + x = Symbol('x') + p = Wild('p') + e = x + assert e.match(-p*x) == {p: -1} + + +def test_match_bug5(): + x = Symbol('x') + p = Wild('p') + e = -x + assert e.match(-p*x) == {p: 1} + + +def test_match_bug6(): + x = Symbol('x') + p = Wild('p') + e = x + assert e.match(3*p*x) == {p: Rational(1)/3} + + +def test_match_polynomial(): + x = Symbol('x') + a = Wild('a', exclude=[x]) + b = Wild('b', exclude=[x]) + c = Wild('c', exclude=[x]) + d = Wild('d', exclude=[x]) + + eq = 4*x**3 + 3*x**2 + 2*x + 1 + pattern = a*x**3 + b*x**2 + c*x + d + assert eq.match(pattern) == {a: 4, b: 3, c: 2, d: 1} + assert (eq - 3*x**2).match(pattern) == {a: 4, b: 0, c: 2, d: 1} + assert (x + sqrt(2) + 3).match(a + b*x + c*x**2) == \ + {b: 1, a: sqrt(2) + 3, c: 0} + + +def test_exclude(): + x, y, a = map(Symbol, 'xya') + p = Wild('p', exclude=[1, x]) + q = Wild('q') + r = Wild('r', exclude=[sin, y]) + + assert sin(x).match(r) is None + assert cos(y).match(r) is None + + e = 3*x**2 + y*x + a + assert e.match(p*x**2 + q*x + r) == {p: 3, q: y, r: a} + + e = x + 1 + assert e.match(x + p) is None + assert e.match(p + 1) is None + assert e.match(x + 1 + p) == {p: 0} + + e = cos(x) + 5*sin(y) + assert e.match(r) is None + assert e.match(cos(y) + r) is None + assert e.match(r + p*sin(q)) == {r: cos(x), p: 5, q: y} + + +def test_floats(): + a, b = map(Wild, 'ab') + + e = cos(0.12345, evaluate=False)**2 + r = e.match(a*cos(b)**2) + assert r == {a: 1, b: Float(0.12345)} + + +def test_Derivative_bug1(): + f = Function("f") + x = abc.x + a = Wild("a", exclude=[f(x)]) + b = Wild("b", exclude=[f(x)]) + eq = f(x).diff(x) + assert eq.match(a*Derivative(f(x), x) + b) == {a: 1, b: 0} + + +def test_match_wild_wild(): + p = Wild('p') + q = Wild('q') + r = Wild('r') + + assert p.match(q + r) in [ {q: p, r: 0}, {q: 0, r: p} ] + assert p.match(q*r) in [ {q: p, r: 1}, {q: 1, r: p} ] + + p = Wild('p') + q = Wild('q', exclude=[p]) + r = Wild('r') + + assert p.match(q + r) == {q: 0, r: p} + assert p.match(q*r) == {q: 1, r: p} + + p = Wild('p') + q = Wild('q', exclude=[p]) + r = Wild('r', exclude=[p]) + + assert p.match(q + r) is None + assert p.match(q*r) is None + + +def test__combine_inverse(): + x, y = symbols("x y") + assert Mul._combine_inverse(x*I*y, x*I) == y + assert Mul._combine_inverse(x*x**(1 + y), x**(1 + y)) == x + assert Mul._combine_inverse(x*I*y, y*I) == x + assert Mul._combine_inverse(oo*I*y, y*I) is oo + assert Mul._combine_inverse(oo*I*y, oo*I) == y + assert Mul._combine_inverse(oo*I*y, oo*I) == y + assert Mul._combine_inverse(oo*y, -oo) == -y + assert Mul._combine_inverse(-oo*y, oo) == -y + assert Mul._combine_inverse((1-exp(x/y)),(exp(x/y)-1)) == -1 + assert Add._combine_inverse(oo, oo) is S.Zero + assert Add._combine_inverse(oo*I, oo*I) is S.Zero + assert Add._combine_inverse(x*oo, x*oo) is S.Zero + assert Add._combine_inverse(-x*oo, -x*oo) is S.Zero + assert Add._combine_inverse((x - oo)*(x + oo), -oo) + + +def test_issue_3773(): + x = symbols('x') + z, phi, r = symbols('z phi r') + c, A, B, N = symbols('c A B N', cls=Wild) + l = Wild('l', exclude=(0,)) + + eq = z * sin(2*phi) * r**7 + matcher = c * sin(phi*N)**l * r**A * log(r)**B + + assert eq.match(matcher) == {c: z, l: 1, N: 2, A: 7, B: 0} + assert (-eq).match(matcher) == {c: -z, l: 1, N: 2, A: 7, B: 0} + assert (x*eq).match(matcher) == {c: x*z, l: 1, N: 2, A: 7, B: 0} + assert (-7*x*eq).match(matcher) == {c: -7*x*z, l: 1, N: 2, A: 7, B: 0} + + matcher = c*sin(phi*N)**l * r**A + + assert eq.match(matcher) == {c: z, l: 1, N: 2, A: 7} + assert (-eq).match(matcher) == {c: -z, l: 1, N: 2, A: 7} + assert (x*eq).match(matcher) == {c: x*z, l: 1, N: 2, A: 7} + assert (-7*x*eq).match(matcher) == {c: -7*x*z, l: 1, N: 2, A: 7} + + +def test_issue_3883(): + from sympy.abc import gamma, mu, x + f = (-gamma * (x - mu)**2 - log(gamma) + log(2*pi))/2 + a, b, c = symbols('a b c', cls=Wild, exclude=(gamma,)) + + assert f.match(a * log(gamma) + b * gamma + c) == \ + {a: Rational(-1, 2), b: -(-mu + x)**2/2, c: log(2*pi)/2} + assert f.expand().collect(gamma).match(a * log(gamma) + b * gamma + c) == \ + {a: Rational(-1, 2), b: (-(x - mu)**2/2).expand(), c: (log(2*pi)/2).expand()} + g1 = Wild('g1', exclude=[gamma]) + g2 = Wild('g2', exclude=[gamma]) + g3 = Wild('g3', exclude=[gamma]) + assert f.expand().match(g1 * log(gamma) + g2 * gamma + g3) == \ + {g3: log(2)/2 + log(pi)/2, g1: Rational(-1, 2), g2: -mu**2/2 + mu*x - x**2/2} + + +def test_issue_4418(): + x = Symbol('x') + a, b, c = symbols('a b c', cls=Wild, exclude=(x,)) + f, g = symbols('f g', cls=Function) + + eq = diff(g(x)*f(x).diff(x), x) + + assert eq.match( + g(x).diff(x)*f(x).diff(x) + g(x)*f(x).diff(x, x) + c) == {c: 0} + assert eq.match(a*g(x).diff( + x)*f(x).diff(x) + b*g(x)*f(x).diff(x, x) + c) == {a: 1, b: 1, c: 0} + + +def test_issue_4700(): + f = Function('f') + x = Symbol('x') + a, b = symbols('a b', cls=Wild, exclude=(f(x),)) + + p = a*f(x) + b + eq1 = sin(x) + eq2 = f(x) + sin(x) + eq3 = f(x) + x + sin(x) + eq4 = x + sin(x) + + assert eq1.match(p) == {a: 0, b: sin(x)} + assert eq2.match(p) == {a: 1, b: sin(x)} + assert eq3.match(p) == {a: 1, b: x + sin(x)} + assert eq4.match(p) == {a: 0, b: x + sin(x)} + + +def test_issue_5168(): + a, b, c = symbols('a b c', cls=Wild) + x = Symbol('x') + f = Function('f') + + assert x.match(a) == {a: x} + assert x.match(a*f(x)**c) == {a: x, c: 0} + assert x.match(a*b) == {a: 1, b: x} + assert x.match(a*b*f(x)**c) == {a: 1, b: x, c: 0} + + assert (-x).match(a) == {a: -x} + assert (-x).match(a*f(x)**c) == {a: -x, c: 0} + assert (-x).match(a*b) == {a: -1, b: x} + assert (-x).match(a*b*f(x)**c) == {a: -1, b: x, c: 0} + + assert (2*x).match(a) == {a: 2*x} + assert (2*x).match(a*f(x)**c) == {a: 2*x, c: 0} + assert (2*x).match(a*b) == {a: 2, b: x} + assert (2*x).match(a*b*f(x)**c) == {a: 2, b: x, c: 0} + + assert (-2*x).match(a) == {a: -2*x} + assert (-2*x).match(a*f(x)**c) == {a: -2*x, c: 0} + assert (-2*x).match(a*b) == {a: -2, b: x} + assert (-2*x).match(a*b*f(x)**c) == {a: -2, b: x, c: 0} + + +def test_issue_4559(): + x = Symbol('x') + e = Symbol('e') + w = Wild('w', exclude=[x]) + y = Wild('y') + + # this is as it should be + + assert (3/x).match(w/y) == {w: 3, y: x} + assert (3*x).match(w*y) == {w: 3, y: x} + assert (x/3).match(y/w) == {w: 3, y: x} + assert (3*x).match(y/w) == {w: S.One/3, y: x} + assert (3*x).match(y/w) == {w: Rational(1, 3), y: x} + + # these could be allowed to fail + + assert (x/3).match(w/y) == {w: S.One/3, y: 1/x} + assert (3*x).match(w/y) == {w: 3, y: 1/x} + assert (3/x).match(w*y) == {w: 3, y: 1/x} + + # Note that solve will give + # multiple roots but match only gives one: + # + # >>> solve(x**r-y**2,y) + # [-x**(r/2), x**(r/2)] + + r = Symbol('r', rational=True) + assert (x**r).match(y**2) == {y: x**(r/2)} + assert (x**e).match(y**2) == {y: sqrt(x**e)} + + # since (x**i = y) -> x = y**(1/i) where i is an integer + # the following should also be valid as long as y is not + # zero when i is negative. + + a = Wild('a') + + e = S.Zero + assert e.match(a) == {a: e} + assert e.match(1/a) is None + assert e.match(a**.3) is None + + e = S(3) + assert e.match(1/a) == {a: 1/e} + assert e.match(1/a**2) == {a: 1/sqrt(e)} + e = pi + assert e.match(1/a) == {a: 1/e} + assert e.match(1/a**2) == {a: 1/sqrt(e)} + assert (-e).match(sqrt(a)) is None + assert (-e).match(a**2) == {a: I*sqrt(pi)} + +# The pattern matcher doesn't know how to handle (x - a)**2 == (a - x)**2. To +# avoid ambiguity in actual applications, don't put a coefficient (including a +# minus sign) in front of a wild. +@XFAIL +def test_issue_4883(): + a = Wild('a') + x = Symbol('x') + + e = [i**2 for i in (x - 2, 2 - x)] + p = [i**2 for i in (x - a, a- x)] + for eq in e: + for pat in p: + assert eq.match(pat) == {a: 2} + + +def test_issue_4319(): + x, y = symbols('x y') + + p = -x*(S.One/8 - y) + ans = {S.Zero, y - S.One/8} + + def ok(pat): + assert set(p.match(pat).values()) == ans + + ok(Wild("coeff", exclude=[x])*x + Wild("rest")) + ok(Wild("w", exclude=[x])*x + Wild("rest")) + ok(Wild("coeff", exclude=[x])*x + Wild("rest")) + ok(Wild("w", exclude=[x])*x + Wild("rest")) + ok(Wild("e", exclude=[x])*x + Wild("rest")) + ok(Wild("ress", exclude=[x])*x + Wild("rest")) + ok(Wild("resu", exclude=[x])*x + Wild("rest")) + + +def test_issue_3778(): + p, c, q = symbols('p c q', cls=Wild) + x = Symbol('x') + + assert (sin(x)**2).match(sin(p)*sin(q)*c) == {q: x, c: 1, p: x} + assert (2*sin(x)).match(sin(p) + sin(q) + c) == {q: x, c: 0, p: x} + + +def test_issue_6103(): + x = Symbol('x') + a = Wild('a') + assert (-I*x*oo).match(I*a*oo) == {a: -x} + + +def test_issue_3539(): + a = Wild('a') + x = Symbol('x') + assert (x - 2).match(a - x) is None + assert (6/x).match(a*x) is None + assert (6/x**2).match(a/x) == {a: 6/x} + +def test_gh_issue_2711(): + x = Symbol('x') + f = meijerg(((), ()), ((0,), ()), x) + a = Wild('a') + b = Wild('b') + + assert f.find(a) == {(S.Zero,), ((), ()), ((S.Zero,), ()), x, S.Zero, + (), meijerg(((), ()), ((S.Zero,), ()), x)} + assert f.find(a + b) == \ + {meijerg(((), ()), ((S.Zero,), ()), x), x, S.Zero} + assert f.find(a**2) == {meijerg(((), ()), ((S.Zero,), ()), x), x} + + +def test_issue_17354(): + from sympy.core.symbol import (Wild, symbols) + x, y = symbols("x y", real=True) + a, b = symbols("a b", cls=Wild) + assert ((0 <= x).reversed | (y <= x)).match((1/a <= b) | (a <= b)) is None + + +def test_match_issue_17397(): + f = Function("f") + x = Symbol("x") + a3 = Wild('a3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + b3 = Wild('b3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + c3 = Wild('c3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + deq = a3*(f(x).diff(x, 2)) + b3*f(x).diff(x) + c3*f(x) + + eq = (x-2)**2*(f(x).diff(x, 2)) + (x-2)*(f(x).diff(x)) + ((x-2)**2 - 4)*f(x) + r = collect(eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + assert r == {a3: (x - 2)**2, c3: (x - 2)**2 - 4, b3: x - 2} + + eq =x*f(x) + x*Derivative(f(x), (x, 2)) - 4*f(x) + Derivative(f(x), x) \ + - 4*Derivative(f(x), (x, 2)) - 2*Derivative(f(x), x)/x + 4*Derivative(f(x), (x, 2))/x + r = collect(eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + assert r == {a3: x - 4 + 4/x, b3: 1 - 2/x, c3: x - 4} + + +def test_match_issue_21942(): + a, r, w = symbols('a, r, w', nonnegative=True) + p = symbols('p', positive=True) + g_ = Wild('g') + pattern = g_ ** (1 / (1 - p)) + eq = (a * r ** (1 - p) + w ** (1 - p) * (1 - a)) ** (1 / (1 - p)) + m = {g_: a * r ** (1 - p) + w ** (1 - p) * (1 - a)} + assert pattern.matches(eq) == m + assert (-pattern).matches(-eq) == m + assert pattern.matches(signsimp(eq)) is None + + +def test_match_terms(): + X, Y = map(Wild, "XY") + x, y, z = symbols('x y z') + assert (5*y - x).match(5*X - Y) == {X: y, Y: x} + # 15907 + assert (x + (y - 1)*z).match(x + X*z) == {X: y - 1} + # 20747 + assert (x - log(x/y)*(1-exp(x/y))).match(x - log(X/y)*(1-exp(x/y))) == {X: x} + + +def test_match_bound(): + V, W = map(Wild, "VW") + x, y = symbols('x y') + assert Sum(x, (x, 1, 2)).match(Sum(y, (y, 1, W))) is None + assert Sum(x, (x, 1, 2)).match(Sum(V, (V, 1, W))) == {W: 2, V:x} + assert Sum(x, (x, 1, 2)).match(Sum(V, (V, 1, 2))) == {V:x} + + +def test_issue_22462(): + x, f = symbols('x'), Function('f') + n, Q = symbols('n Q', cls=Wild) + pattern = -Q*f(x)**n + eq = 5*f(x)**2 + assert pattern.matches(eq) == {n: 2, Q: -5} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py new file mode 100644 index 0000000000000000000000000000000000000000..765c78adf8dbed2ead43721ca4ab9510dbeeb282 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py @@ -0,0 +1,24 @@ +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.symbol import symbols +from sympy.functions.elementary.trigonometric import sin +from sympy.core.multidimensional import vectorize +x, y, z = symbols('x y z') +f, g, h = list(map(Function, 'fgh')) + + +def test_vectorize(): + @vectorize(0) + def vsin(x): + return sin(x) + + assert vsin([1, x, y]) == [sin(1), sin(x), sin(y)] + + @vectorize(0, 1) + def vdiff(f, y): + return diff(f, y) + + assert vdiff([f(x, y, z), g(x, y, z), h(x, y, z)], [x, y, z]) == \ + [[Derivative(f(x, y, z), x), Derivative(f(x, y, z), y), + Derivative(f(x, y, z), z)], [Derivative(g(x, y, z), x), + Derivative(g(x, y, z), y), Derivative(g(x, y, z), z)], + [Derivative(h(x, y, z), x), Derivative(h(x, y, z), y), Derivative(h(x, y, z), z)]] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py new file mode 100644 index 0000000000000000000000000000000000000000..b3d3a3cec2ef64aa500aad08b438c90cc8987581 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py @@ -0,0 +1,140 @@ +"""Tests for noncommutative symbols and expressions.""" + +from sympy.core.function import expand +from sympy.core.numbers import I +from sympy.core.symbol import symbols +from sympy.functions.elementary.complexes import (adjoint, conjugate, transpose) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.polys.polytools import (cancel, factor) +from sympy.simplify.combsimp import combsimp +from sympy.simplify.gammasimp import gammasimp +from sympy.simplify.radsimp import (collect, radsimp, rcollect) +from sympy.simplify.ratsimp import ratsimp +from sympy.simplify.simplify import (posify, simplify) +from sympy.simplify.trigsimp import trigsimp +from sympy.abc import x, y, z +from sympy.testing.pytest import XFAIL + +A, B, C = symbols("A B C", commutative=False) +X = symbols("X", commutative=False, hermitian=True) +Y = symbols("Y", commutative=False, antihermitian=True) + + +def test_adjoint(): + assert adjoint(A).is_commutative is False + assert adjoint(A*A) == adjoint(A)**2 + assert adjoint(A*B) == adjoint(B)*adjoint(A) + assert adjoint(A*B**2) == adjoint(B)**2*adjoint(A) + assert adjoint(A*B - B*A) == adjoint(B)*adjoint(A) - adjoint(A)*adjoint(B) + assert adjoint(A + I*B) == adjoint(A) - I*adjoint(B) + + assert adjoint(X) == X + assert adjoint(-I*X) == I*X + assert adjoint(Y) == -Y + assert adjoint(-I*Y) == -I*Y + + assert adjoint(X) == conjugate(transpose(X)) + assert adjoint(Y) == conjugate(transpose(Y)) + assert adjoint(X) == transpose(conjugate(X)) + assert adjoint(Y) == transpose(conjugate(Y)) + + +def test_cancel(): + assert cancel(A*B - B*A) == A*B - B*A + assert cancel(A*B*(x - 1)) == A*B*(x - 1) + assert cancel(A*B*(x**2 - 1)/(x + 1)) == A*B*(x - 1) + assert cancel(A*B*(x**2 - 1)/(x + 1) - B*A*(x - 1)) == A*B*(x - 1) + (1 - x)*B*A + + +@XFAIL +def test_collect(): + assert collect(A*B - B*A, A) == A*B - B*A + assert collect(A*B - B*A, B) == A*B - B*A + assert collect(A*B - B*A, x) == A*B - B*A + + +def test_combsimp(): + assert combsimp(A*B - B*A) == A*B - B*A + + +def test_gammasimp(): + assert gammasimp(A*B - B*A) == A*B - B*A + + +def test_conjugate(): + assert conjugate(A).is_commutative is False + assert (A*A).conjugate() == conjugate(A)**2 + assert (A*B).conjugate() == conjugate(A)*conjugate(B) + assert (A*B**2).conjugate() == conjugate(A)*conjugate(B)**2 + assert (A*B - B*A).conjugate() == \ + conjugate(A)*conjugate(B) - conjugate(B)*conjugate(A) + assert (A*B).conjugate() - (B*A).conjugate() == \ + conjugate(A)*conjugate(B) - conjugate(B)*conjugate(A) + assert (A + I*B).conjugate() == conjugate(A) - I*conjugate(B) + + +def test_expand(): + assert expand((A*B)**2) == A*B*A*B + assert expand(A*B - B*A) == A*B - B*A + assert expand((A*B/A)**2) == A*B*B/A + assert expand(B*A*(A + B)*B) == B*A**2*B + B*A*B**2 + assert expand(B*A*(A + C)*B) == B*A**2*B + B*A*C*B + + +def test_factor(): + assert factor(A*B - B*A) == A*B - B*A + + +def test_posify(): + assert posify(A)[0].is_commutative is False + for q in (A*B/A, (A*B/A)**2, (A*B)**2, A*B - B*A): + p = posify(q) + assert p[0].subs(p[1]) == q + + +def test_radsimp(): + assert radsimp(A*B - B*A) == A*B - B*A + + +@XFAIL +def test_ratsimp(): + assert ratsimp(A*B - B*A) == A*B - B*A + + +@XFAIL +def test_rcollect(): + assert rcollect(A*B - B*A, A) == A*B - B*A + assert rcollect(A*B - B*A, B) == A*B - B*A + assert rcollect(A*B - B*A, x) == A*B - B*A + + +def test_simplify(): + assert simplify(A*B - B*A) == A*B - B*A + + +def test_subs(): + assert (x*y*A).subs(x*y, z) == A*z + assert (x*A*B).subs(x*A, C) == C*B + assert (x*A*x*x).subs(x**2*A, C) == x*C + assert (x*A*x*B).subs(x**2*A, C) == C*B + assert (A**2*B**2).subs(A*B**2, C) == A*C + assert (A*A*A + A*B*A).subs(A*A*A, C) == C + A*B*A + + +def test_transpose(): + assert transpose(A).is_commutative is False + assert transpose(A*A) == transpose(A)**2 + assert transpose(A*B) == transpose(B)*transpose(A) + assert transpose(A*B**2) == transpose(B)**2*transpose(A) + assert transpose(A*B - B*A) == \ + transpose(B)*transpose(A) - transpose(A)*transpose(B) + assert transpose(A + I*B) == transpose(A) + I*transpose(B) + + assert transpose(X) == conjugate(X) + assert transpose(-I*X) == -I*conjugate(X) + assert transpose(Y) == -conjugate(Y) + assert transpose(-I*Y) == I*conjugate(Y) + + +def test_trigsimp(): + assert trigsimp(A*sin(x)**2 + A*cos(x)**2) == A diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..10d14b6ac09fb0ab102c37cb99405440bd0bbffb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py @@ -0,0 +1,2335 @@ +import numbers as nums +import decimal +from sympy.concrete.summations import Sum +from sympy.core import (EulerGamma, Catalan, TribonacciConstant, + GoldenRatio) +from sympy.core.containers import Tuple +from sympy.core.expr import unchanged +from sympy.core.logic import fuzzy_not +from sympy.core.mul import Mul +from sympy.core.numbers import (mpf_norm, seterr, + Integer, I, pi, comp, Rational, E, nan, + oo, AlgebraicNumber, Number, Float, zoo, equal_valued, + int_valued, all_close) +from sympy.core.intfunc import (igcd, igcdex, igcd2, igcd_lehmer, + ilcm, integer_nthroot, isqrt, integer_log, mod_inverse) +from sympy.core.power import Pow +from sympy.core.relational import Ge, Gt, Le, Lt +from sympy.core.singleton import S +from sympy.core.symbol import Dummy, Symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.integers import floor +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import sqrt, cbrt +from sympy.functions.elementary.trigonometric import cos, sin +from sympy.polys.domains.realfield import RealField +from sympy.printing.latex import latex +from sympy.printing.repr import srepr +from sympy.simplify import simplify +from sympy.polys.domains.groundtypes import PythonRational +from sympy.utilities.decorator import conserve_mpmath_dps +from sympy.utilities.iterables import permutations +from sympy.testing.pytest import (XFAIL, raises, _both_exp_pow, + warns_deprecated_sympy) +from sympy import Add + +from mpmath import mpf +import mpmath +from sympy.core import numbers +t = Symbol('t', real=False) + +_ninf = float(-oo) +_inf = float(oo) + + +def same_and_same_prec(a, b): + # stricter matching for Floats + return a == b and a._prec == b._prec + + +def test_seterr(): + seterr(divide=True) + raises(ValueError, lambda: S.Zero/S.Zero) + seterr(divide=False) + assert S.Zero / S.Zero is S.NaN + + +def test_mod(): + x = S.Half + y = Rational(3, 4) + z = Rational(5, 18043) + + assert x % x == 0 + assert x % y == S.Half + assert x % z == Rational(3, 36086) + assert y % x == Rational(1, 4) + assert y % y == 0 + assert y % z == Rational(9, 72172) + assert z % x == Rational(5, 18043) + assert z % y == Rational(5, 18043) + assert z % z == 0 + + a = Float(2.6) + + assert (a % .2) == 0.0 + assert (a % 2).round(15) == 0.6 + assert (a % 0.5).round(15) == 0.1 + + p = Symbol('p', infinite=True) + + assert oo % oo is nan + assert zoo % oo is nan + assert 5 % oo is nan + assert p % 5 is nan + + # In these two tests, if the precision of m does + # not match the precision of the ans, then it is + # likely that the change made now gives an answer + # with degraded accuracy. + r = Rational(500, 41) + f = Float('.36', 3) + m = r % f + ans = Float(r % Rational(f), 3) + assert m == ans and m._prec == ans._prec + f = Float('8.36', 3) + m = f % r + ans = Float(Rational(f) % r, 3) + assert m == ans and m._prec == ans._prec + + s = S.Zero + + assert s % float(1) == 0.0 + + # No rounding required since these numbers can be represented + # exactly. + assert Rational(3, 4) % Float(1.1) == 0.75 + assert Float(1.5) % Rational(5, 4) == 0.25 + assert Rational(5, 4).__rmod__(Float('1.5')) == 0.25 + assert Float('1.5').__rmod__(Float('2.75')) == Float('1.25') + assert 2.75 % Float('1.5') == Float('1.25') + + a = Integer(7) + b = Integer(4) + + assert type(a % b) == Integer + assert a % b == Integer(3) + assert Integer(1) % Rational(2, 3) == Rational(1, 3) + assert Rational(7, 5) % Integer(1) == Rational(2, 5) + assert Integer(2) % 1.5 == 0.5 + + assert Integer(3).__rmod__(Integer(10)) == Integer(1) + assert Integer(10) % 4 == Integer(2) + assert 15 % Integer(4) == Integer(3) + + +def test_divmod(): + x = Symbol("x") + assert divmod(S(12), S(8)) == Tuple(1, 4) + assert divmod(-S(12), S(8)) == Tuple(-2, 4) + assert divmod(S.Zero, S.One) == Tuple(0, 0) + raises(ZeroDivisionError, lambda: divmod(S.Zero, S.Zero)) + raises(ZeroDivisionError, lambda: divmod(S.One, S.Zero)) + assert divmod(S(12), 8) == Tuple(1, 4) + assert divmod(12, S(8)) == Tuple(1, 4) + assert S(1024)//x == 1024//x == floor(1024/x) + + assert divmod(S("2"), S("3/2")) == Tuple(S("1"), S("1/2")) + assert divmod(S("3/2"), S("2")) == Tuple(S("0"), S("3/2")) + assert divmod(S("2"), S("3.5")) == Tuple(S("0"), S("2.")) + assert divmod(S("3.5"), S("2")) == Tuple(S("1"), S("1.5")) + assert divmod(S("2"), S("1/3")) == Tuple(S("6"), S("0")) + assert divmod(S("1/3"), S("2")) == Tuple(S("0"), S("1/3")) + assert divmod(S("2"), S("1/10")) == Tuple(S("20"), S("0")) + assert divmod(S("2"), S(".1"))[0] == 19 + assert divmod(S("0.1"), S("2")) == Tuple(S("0"), S("0.1")) + assert divmod(S("2"), 2) == Tuple(S("1"), S("0")) + assert divmod(2, S("2")) == Tuple(S("1"), S("0")) + assert divmod(S("2"), 1.5) == Tuple(S("1"), S("0.5")) + assert divmod(1.5, S("2")) == Tuple(S("0"), S("1.5")) + assert divmod(0.3, S("2")) == Tuple(S("0"), S("0.3")) + assert divmod(S("3/2"), S("3.5")) == Tuple(S("0"), S(3/2)) + assert divmod(S("3.5"), S("3/2")) == Tuple(S("2"), S("0.5")) + assert divmod(S("3/2"), S("1/3")) == Tuple(S("4"), S("1/6")) + assert divmod(S("1/3"), S("3/2")) == Tuple(S("0"), S("1/3")) + assert divmod(S("3/2"), S("0.1"))[0] == 14 + assert divmod(S("0.1"), S("3/2")) == Tuple(S("0"), S("0.1")) + assert divmod(S("3/2"), 2) == Tuple(S("0"), S("3/2")) + assert divmod(2, S("3/2")) == Tuple(S("1"), S("1/2")) + assert divmod(S("3/2"), 1.5) == Tuple(S("1"), S("0.")) + assert divmod(1.5, S("3/2")) == Tuple(S("1"), S("0.")) + assert divmod(S("3/2"), 0.3) == Tuple(S("5"), S("0.")) + assert divmod(0.3, S("3/2")) == Tuple(S("0"), S("0.3")) + assert divmod(S("1/3"), S("3.5")) == (0, 1/3) + assert divmod(S("3.5"), S("0.1")) == Tuple(S("35"), S("0.")) + assert divmod(S("0.1"), S("3.5")) == Tuple(S("0"), S("0.1")) + assert divmod(S("3.5"), 2) == Tuple(S("1"), S("1.5")) + assert divmod(2, S("3.5")) == Tuple(S("0"), S("2.")) + assert divmod(S("3.5"), 1.5) == Tuple(S("2"), S("0.5")) + assert divmod(1.5, S("3.5")) == Tuple(S("0"), S("1.5")) + assert divmod(0.3, S("3.5")) == Tuple(S("0"), S("0.3")) + assert divmod(S("0.1"), S("1/3")) == Tuple(S("0"), S("0.1")) + assert divmod(S("1/3"), 2) == Tuple(S("0"), S("1/3")) + assert divmod(2, S("1/3")) == Tuple(S("6"), S("0")) + assert divmod(S("1/3"), 1.5) == (0, 1/3) + assert divmod(0.3, S("1/3")) == (0, 0.3) + assert divmod(S("0.1"), 2) == (0, 0.1) + assert divmod(2, S("0.1"))[0] == 19 + assert divmod(S("0.1"), 1.5) == (0, 0.1) + assert divmod(1.5, S("0.1")) == Tuple(S("15"), S("0.")) + assert divmod(S("0.1"), 0.3) == Tuple(S("0"), S("0.1")) + + assert str(divmod(S("2"), 0.3)) == '(6, 0.2)' + assert str(divmod(S("3.5"), S("1/3"))) == '(10, 0.166666666666667)' + assert str(divmod(S("3.5"), 0.3)) == '(11, 0.2)' + assert str(divmod(S("1/3"), S("0.1"))) == '(3, 0.0333333333333333)' + assert str(divmod(1.5, S("1/3"))) == '(4, 0.166666666666667)' + assert str(divmod(S("1/3"), 0.3)) == '(1, 0.0333333333333333)' + assert str(divmod(0.3, S("0.1"))) == '(2, 0.1)' + + assert divmod(-3, S(2)) == (-2, 1) + assert divmod(S(-3), S(2)) == (-2, 1) + assert divmod(S(-3), 2) == (-2, 1) + + assert divmod(oo, 1) == (S.NaN, S.NaN) + assert divmod(S.NaN, 1) == (S.NaN, S.NaN) + assert divmod(1, S.NaN) == (S.NaN, S.NaN) + ans = [(-1, oo), (-1, oo), (0, 0), (0, 1), (0, 2)] + OO = float('inf') + ANS = [tuple(map(float, i)) for i in ans] + assert [divmod(i, oo) for i in range(-2, 3)] == ans + ans = [(0, -2), (0, -1), (0, 0), (-1, -oo), (-1, -oo)] + ANS = [tuple(map(float, i)) for i in ans] + assert [divmod(i, -oo) for i in range(-2, 3)] == ans + assert [divmod(i, -OO) for i in range(-2, 3)] == ANS + + # sympy's divmod gives an Integer for the quotient rather than a float + dmod = lambda a, b: tuple([j if i else int(j) for i, j in enumerate(divmod(a, b))]) + for a in (4, 4., 4.25, 0, 0., -4, -4. -4.25): + for b in (2, 2., 2.5, -2, -2., -2.5): + assert divmod(S(a), S(b)) == dmod(a, b) + + +def test_igcd(): + assert igcd(0, 0) == 0 + assert igcd(0, 1) == 1 + assert igcd(1, 0) == 1 + assert igcd(0, 7) == 7 + assert igcd(7, 0) == 7 + assert igcd(7, 1) == 1 + assert igcd(1, 7) == 1 + assert igcd(-1, 0) == 1 + assert igcd(0, -1) == 1 + assert igcd(-1, -1) == 1 + assert igcd(-1, 7) == 1 + assert igcd(7, -1) == 1 + assert igcd(8, 2) == 2 + assert igcd(4, 8) == 4 + assert igcd(8, 16) == 8 + assert igcd(7, -3) == 1 + assert igcd(-7, 3) == 1 + assert igcd(-7, -3) == 1 + assert igcd(*[10, 20, 30]) == 10 + raises(TypeError, lambda: igcd()) + raises(TypeError, lambda: igcd(2)) + raises(ValueError, lambda: igcd(0, None)) + raises(ValueError, lambda: igcd(1, 2.2)) + for args in permutations((45.1, 1, 30)): + raises(ValueError, lambda: igcd(*args)) + for args in permutations((1, 2, None)): + raises(ValueError, lambda: igcd(*args)) + + +def test_igcd_lehmer(): + a, b = fibonacci(10001), fibonacci(10000) + # len(str(a)) == 2090 + # small divisors, long Euclidean sequence + assert igcd_lehmer(a, b) == 1 + c = fibonacci(100) + assert igcd_lehmer(a*c, b*c) == c + # big divisor + assert igcd_lehmer(a, 10**1000) == 1 + # swapping argument + assert igcd_lehmer(1, 2) == igcd_lehmer(2, 1) + + +def test_igcd2(): + # short loop + assert igcd2(2**100 - 1, 2**99 - 1) == 1 + # Lehmer's algorithm + a, b = int(fibonacci(10001)), int(fibonacci(10000)) + assert igcd2(a, b) == 1 + + +def test_ilcm(): + assert ilcm(0, 0) == 0 + assert ilcm(1, 0) == 0 + assert ilcm(0, 1) == 0 + assert ilcm(1, 1) == 1 + assert ilcm(2, 1) == 2 + assert ilcm(8, 2) == 8 + assert ilcm(8, 6) == 24 + assert ilcm(8, 7) == 56 + assert ilcm(*[10, 20, 30]) == 60 + raises(ValueError, lambda: ilcm(8.1, 7)) + raises(ValueError, lambda: ilcm(8, 7.1)) + raises(TypeError, lambda: ilcm(8)) + + +def test_igcdex(): + assert igcdex(2, 3) == (-1, 1, 1) + assert igcdex(10, 12) == (-1, 1, 2) + assert igcdex(100, 2004) == (-20, 1, 4) + assert igcdex(0, 0) == (0, 0, 0) + assert igcdex(1, 0) == (1, 0, 1) + + +def _strictly_equal(a, b): + return (a.p, a.q, type(a.p), type(a.q)) == \ + (b.p, b.q, type(b.p), type(b.q)) + + +def _test_rational_new(cls): + """ + Tests that are common between Integer and Rational. + """ + assert cls(0) is S.Zero + assert cls(1) is S.One + assert cls(-1) is S.NegativeOne + # These look odd, but are similar to int(): + assert cls('1') is S.One + assert cls('-1') is S.NegativeOne + + i = Integer(10) + assert _strictly_equal(i, cls('10')) + assert _strictly_equal(i, cls('10')) + assert _strictly_equal(i, cls(int(10))) + assert _strictly_equal(i, cls(i)) + + raises(TypeError, lambda: cls(Symbol('x'))) + + +def test_Integer_new(): + """ + Test for Integer constructor + """ + _test_rational_new(Integer) + + assert _strictly_equal(Integer(0.9), S.Zero) + assert _strictly_equal(Integer(10.5), Integer(10)) + raises(ValueError, lambda: Integer("10.5")) + assert Integer(Rational('1.' + '9'*20)) == 1 + + +def test_Rational_new(): + """" + Test for Rational constructor + """ + _test_rational_new(Rational) + + n1 = S.Half + assert n1 == Rational(Integer(1), 2) + assert n1 == Rational(Integer(1), Integer(2)) + assert n1 == Rational(1, Integer(2)) + assert n1 == Rational(S.Half) + assert 1 == Rational(n1, n1) + assert Rational(3, 2) == Rational(S.Half, Rational(1, 3)) + assert Rational(3, 1) == Rational(1, Rational(1, 3)) + n3_4 = Rational(3, 4) + assert Rational('3/4') == n3_4 + assert -Rational('-3/4') == n3_4 + assert Rational('.76').limit_denominator(4) == n3_4 + assert Rational(19, 25).limit_denominator(4) == n3_4 + assert Rational('19/25').limit_denominator(4) == n3_4 + assert Rational(1.0, 3) == Rational(1, 3) + assert Rational(1, 3.0) == Rational(1, 3) + assert Rational(Float(0.5)) == S.Half + assert Rational('1e2/1e-2') == Rational(10000) + assert Rational('1 234') == Rational(1234) + assert Rational('1/1 234') == Rational(1, 1234) + assert Rational(-1, 0) is S.ComplexInfinity + assert Rational(1, 0) is S.ComplexInfinity + # Make sure Rational doesn't lose precision on Floats + assert Rational(pi.evalf(100)).evalf(100) == pi.evalf(100) + raises(TypeError, lambda: Rational('3**3')) + raises(TypeError, lambda: Rational('1/2 + 2/3')) + + # handle fractions.Fraction instances + try: + import fractions + assert Rational(fractions.Fraction(1, 2)) == S.Half + except ImportError: + pass + + assert Rational(PythonRational(2, 6)) == Rational(1, 3) + + with warns_deprecated_sympy(): + assert Rational(2, 4, gcd=1).q == 4 + with warns_deprecated_sympy(): + n = Rational(2, -4, gcd=1) + assert n.q == 4 + assert n.p == -2 + + assert Rational.from_coprime_ints(3, 5) == Rational(3, 5) + + +def test_issue_24543(): + for p in ('1.5', 1.5, 2): + for q in ('1.5', 1.5, 2): + assert Rational(p, q).as_numer_denom() == Rational('%s/%s'%(p,q)).as_numer_denom() + + assert Rational('0.5', '100') == Rational(1, 200) + + +def test_Number_new(): + """" + Test for Number constructor + """ + # Expected behavior on numbers and strings + assert Number(1) is S.One + assert Number(2).__class__ is Integer + assert Number(-622).__class__ is Integer + assert Number(5, 3).__class__ is Rational + assert Number(5.3).__class__ is Float + assert Number('1') is S.One + assert Number('2').__class__ is Integer + assert Number('-622').__class__ is Integer + assert Number('5/3').__class__ is Rational + assert Number('5.3').__class__ is Float + raises(ValueError, lambda: Number('cos')) + raises(TypeError, lambda: Number(cos)) + a = Rational(3, 5) + assert Number(a) is a # Check idempotence on Numbers + u = ['inf', '-inf', 'nan', 'iNF', '+inf'] + v = [oo, -oo, nan, oo, oo] + for i, a in zip(u, v): + assert Number(i) is a, (i, Number(i), a) + + +def test_Number_cmp(): + n1 = Number(1) + n2 = Number(2) + n3 = Number(-3) + + assert n1 < n2 + assert n1 <= n2 + assert n3 < n1 + assert n2 > n3 + assert n2 >= n3 + + raises(TypeError, lambda: n1 < S.NaN) + raises(TypeError, lambda: n1 <= S.NaN) + raises(TypeError, lambda: n1 > S.NaN) + raises(TypeError, lambda: n1 >= S.NaN) + + +def test_Rational_cmp(): + n1 = Rational(1, 4) + n2 = Rational(1, 3) + n3 = Rational(2, 4) + n4 = Rational(2, -4) + n5 = Rational(0) + n6 = Rational(1) + n7 = Rational(3) + n8 = Rational(-3) + + assert n8 < n5 + assert n5 < n6 + assert n6 < n7 + assert n8 < n7 + assert n7 > n8 + assert (n1 + 1)**n2 < 2 + assert ((n1 + n6)/n7) < 1 + + assert n4 < n3 + assert n2 < n3 + assert n1 < n2 + assert n3 > n1 + assert not n3 < n1 + assert not (Rational(-1) > 0) + assert Rational(-1) < 0 + + raises(TypeError, lambda: n1 < S.NaN) + raises(TypeError, lambda: n1 <= S.NaN) + raises(TypeError, lambda: n1 > S.NaN) + raises(TypeError, lambda: n1 >= S.NaN) + + +def test_Float(): + def eq(a, b): + t = Float("1.0E-15") + return (-t < a - b < t) + + equal_pairs = [ + (0, 0.0), # This is just how Python works... + (0, S.Zero), + (0.0, Float(0)), + ] + unequal_pairs = [ + (0.0, S.Zero), + (0, Float(0)), + (S.Zero, Float(0)), + ] + for p1, p2 in equal_pairs: + assert (p1 == p2) is True + assert (p1 != p2) is False + assert (p2 == p1) is True + assert (p2 != p1) is False + for p1, p2 in unequal_pairs: + assert (p1 == p2) is False + assert (p1 != p2) is True + assert (p2 == p1) is False + assert (p2 != p1) is True + + assert S.Zero.is_zero + + a = Float(2) ** Float(3) + assert eq(a.evalf(), Float(8)) + assert eq((pi ** -1).evalf(), Float("0.31830988618379067")) + a = Float(2) ** Float(4) + assert eq(a.evalf(), Float(16)) + assert (S(.3) == S(.5)) is False + + mpf = (0, 5404319552844595, -52, 53) + x_str = Float((0, '13333333333333', -52, 53)) + x_0xstr = Float((0, '0x13333333333333', -52, 53)) + x2_str = Float((0, '26666666666666', -53, 54)) + x_hex = Float((0, int(0x13333333333333), -52, 53)) + x_dec = Float(mpf) + assert x_str == x_0xstr == x_hex == x_dec == Float(1.2) + # x2_str was entered slightly malformed in that the mantissa + # was even -- it should be odd and the even part should be + # included with the exponent, but this is resolved by normalization + # ONLY IF REQUIREMENTS of mpf_norm are met: the bitcount must + # be exact: double the mantissa ==> increase bc by 1 + assert Float(1.2)._mpf_ == mpf + assert x2_str._mpf_ == mpf + + assert Float((0, int(0), -123, -1)) is S.NaN + assert Float((0, int(0), -456, -2)) is S.Infinity + assert Float((1, int(0), -789, -3)) is S.NegativeInfinity + # if you don't give the full signature, it's not special + assert Float((0, int(0), -123)) == Float(0) + assert Float((0, int(0), -456)) == Float(0) + assert Float((1, int(0), -789)) == Float(0) + + raises(ValueError, lambda: Float((0, 7, 1, 3), '')) + + assert Float('0.0').is_finite is True + assert Float('0.0').is_negative is False + assert Float('0.0').is_positive is False + assert Float('0.0').is_infinite is False + assert Float('0.0').is_zero is True + + # rationality properties + # if the integer test fails then the use of intlike + # should be removed from gamma_functions.py + assert Float(1).is_integer is None + assert Float(1).is_rational is None + assert Float(1).is_irrational is None + assert sqrt(2).n(15).is_rational is None + assert sqrt(2).n(15).is_irrational is None + + # do not automatically evalf + def teq(a): + assert (a.evalf() == a) is False + assert (a.evalf() != a) is True + assert (a == a.evalf()) is False + assert (a != a.evalf()) is True + + teq(pi) + teq(2*pi) + teq(cos(0.1, evaluate=False)) + + # long integer + i = 12345678901234567890 + assert same_and_same_prec(Float(12, ''), Float('12', '')) + assert same_and_same_prec(Float(Integer(i), ''), Float(i, '')) + assert same_and_same_prec(Float(i, ''), Float(str(i), 20)) + assert same_and_same_prec(Float(str(i)), Float(i, '')) + assert same_and_same_prec(Float(i), Float(i, '')) + + # inexact floats (repeating binary = denom not multiple of 2) + # cannot have precision greater than 15 + assert Float(.125, 22)._prec == 76 + assert Float(2.0, 22)._prec == 76 + # only default prec is equal, even for exactly representable float + assert Float(.125, 22) != .125 + #assert Float(2.0, 22) == 2 + assert float(Float('.12500000000000001', '')) == .125 + raises(ValueError, lambda: Float(.12500000000000001, '')) + + # allow spaces + assert Float('123 456.123 456') == Float('123456.123456') + assert Integer('123 456') == Integer('123456') + assert Rational('123 456.123 456') == Rational('123456.123456') + assert Float(' .3e2') == Float('0.3e2') + # but treat them as strictly ass underscore between digits: only 1 + raises(ValueError, lambda: Float('1 2')) + + # allow underscore between digits + assert Float('1_23.4_56') == Float('123.456') + # assert Float('1_23.4_5_6', 12) == Float('123.456', 12) + # ...but not in all cases (per Py 3.6) + raises(ValueError, lambda: Float('1_')) + raises(ValueError, lambda: Float('1__2')) + raises(ValueError, lambda: Float('_1')) + raises(ValueError, lambda: Float('_inf')) + + # allow auto precision detection + assert Float('.1', '') == Float(.1, 1) + assert Float('.125', '') == Float(.125, 3) + assert Float('.100', '') == Float(.1, 3) + assert Float('2.0', '') == Float('2', 2) + + raises(ValueError, lambda: Float("12.3d-4", "")) + raises(ValueError, lambda: Float(12.3, "")) + raises(ValueError, lambda: Float('.')) + raises(ValueError, lambda: Float('-.')) + + zero = Float('0.0') + assert Float('-0') == zero + assert Float('.0') == zero + assert Float('-.0') == zero + assert Float('-0.0') == zero + assert Float(0.0) == zero + assert Float(0) == zero + assert Float(0, '') == Float('0', '') + assert Float(1) == Float(1.0) + assert Float(S.Zero) == zero + assert Float(S.One) == Float(1.0) + + assert Float(decimal.Decimal('0.1'), 3) == Float('.1', 3) + assert Float(decimal.Decimal('nan')) is S.NaN + assert Float(decimal.Decimal('Infinity')) is S.Infinity + assert Float(decimal.Decimal('-Infinity')) is S.NegativeInfinity + + assert '{:.3f}'.format(Float(4.236622)) == '4.237' + assert '{:.35f}'.format(Float(pi.n(40), 40)) == \ + '3.14159265358979323846264338327950288' + + # unicode + assert Float('0.73908513321516064100000000') == \ + Float('0.73908513321516064100000000') + assert Float('0.73908513321516064100000000', 28) == \ + Float('0.73908513321516064100000000', 28) + + # binary precision + # Decimal value 0.1 cannot be expressed precisely as a base 2 fraction + a = Float(S.One/10, dps=15) + b = Float(S.One/10, dps=16) + p = Float(S.One/10, precision=53) + q = Float(S.One/10, precision=54) + assert a._mpf_ == p._mpf_ + assert not a._mpf_ == q._mpf_ + assert not b._mpf_ == q._mpf_ + + # Precision specifying errors + raises(ValueError, lambda: Float("1.23", dps=3, precision=10)) + raises(ValueError, lambda: Float("1.23", dps="", precision=10)) + raises(ValueError, lambda: Float("1.23", dps=3, precision="")) + raises(ValueError, lambda: Float("1.23", dps="", precision="")) + + # from NumberSymbol + assert same_and_same_prec(Float(pi, 32), pi.evalf(32)) + assert same_and_same_prec(Float(Catalan), Catalan.evalf()) + + # oo and nan + u = ['inf', '-inf', 'nan', 'iNF', '+inf'] + v = [oo, -oo, nan, oo, oo] + for i, a in zip(u, v): + assert Float(i) is a + + +def test_zero_not_false(): + # https://github.com/sympy/sympy/issues/20796 + assert (S(0.0) == S.false) is False + assert (S.false == S(0.0)) is False + assert (S(0) == S.false) is False + assert (S.false == S(0)) is False + + +@conserve_mpmath_dps +def test_float_mpf(): + import mpmath + mpmath.mp.dps = 100 + mp_pi = mpmath.pi() + + assert Float(mp_pi, 100) == Float(mp_pi._mpf_, 100) == pi.evalf(100) + + mpmath.mp.dps = 15 + + assert Float(mp_pi, 100) == Float(mp_pi._mpf_, 100) == pi.evalf(100) + + +def test_Float_RealElement(): + repi = RealField(dps=100)(pi.evalf(100)) + # We still have to pass the precision because Float doesn't know what + # RealElement is, but make sure it keeps full precision from the result. + assert Float(repi, 100) == pi.evalf(100) + + +def test_Float_default_to_highprec_from_str(): + s = str(pi.evalf(128)) + assert same_and_same_prec(Float(s), Float(s, '')) + + +def test_Float_eval(): + a = Float(3.2) + assert (a**2).is_Float + + +def test_Float_issue_2107(): + a = Float(0.1, 10) + b = Float("0.1", 10) + + assert a - a == 0 + assert a + (-a) == 0 + assert S.Zero + a - a == 0 + assert S.Zero + a + (-a) == 0 + + assert b - b == 0 + assert b + (-b) == 0 + assert S.Zero + b - b == 0 + assert S.Zero + b + (-b) == 0 + + +def test_issue_14289(): + from sympy.polys.numberfields import to_number_field + + a = 1 - sqrt(2) + b = to_number_field(a) + assert b.as_expr() == a + assert b.minpoly(a).expand() == 0 + + +def test_Float_from_tuple(): + a = Float((0, '1L', 0, 1)) + b = Float((0, '1', 0, 1)) + assert a == b + + +def test_Infinity(): + assert oo != 1 + assert 1*oo is oo + assert 1 != oo + assert oo != -oo + assert oo != Symbol("x")**3 + assert oo + 1 is oo + assert 2 + oo is oo + assert 3*oo + 2 is oo + assert S.Half**oo == 0 + assert S.Half**(-oo) is oo + assert -oo*3 is -oo + assert oo + oo is oo + assert -oo + oo*(-5) is -oo + assert 1/oo == 0 + assert 1/(-oo) == 0 + assert 8/oo == 0 + assert oo % 2 is nan + assert 2 % oo is nan + assert oo/oo is nan + assert oo/-oo is nan + assert -oo/oo is nan + assert -oo/-oo is nan + assert oo - oo is nan + assert oo - -oo is oo + assert -oo - oo is -oo + assert -oo - -oo is nan + assert oo + -oo is nan + assert -oo + oo is nan + assert oo + oo is oo + assert -oo + oo is nan + assert oo + -oo is nan + assert -oo + -oo is -oo + assert oo*oo is oo + assert -oo*oo is -oo + assert oo*-oo is -oo + assert -oo*-oo is oo + assert oo/0 is oo + assert -oo/0 is -oo + assert 0/oo == 0 + assert 0/-oo == 0 + assert oo*0 is nan + assert -oo*0 is nan + assert 0*oo is nan + assert 0*-oo is nan + assert oo + 0 is oo + assert -oo + 0 is -oo + assert 0 + oo is oo + assert 0 + -oo is -oo + assert oo - 0 is oo + assert -oo - 0 is -oo + assert 0 - oo is -oo + assert 0 - -oo is oo + assert oo/2 is oo + assert -oo/2 is -oo + assert oo/-2 is -oo + assert -oo/-2 is oo + assert oo*2 is oo + assert -oo*2 is -oo + assert oo*-2 is -oo + assert 2/oo == 0 + assert 2/-oo == 0 + assert -2/oo == 0 + assert -2/-oo == 0 + assert 2*oo is oo + assert 2*-oo is -oo + assert -2*oo is -oo + assert -2*-oo is oo + assert 2 + oo is oo + assert 2 - oo is -oo + assert -2 + oo is oo + assert -2 - oo is -oo + assert 2 + -oo is -oo + assert 2 - -oo is oo + assert -2 + -oo is -oo + assert -2 - -oo is oo + assert S(2) + oo is oo + assert S(2) - oo is -oo + assert oo/I == -oo*I + assert -oo/I == oo*I + assert oo*float(1) == _inf and (oo*float(1)) is oo + assert -oo*float(1) == _ninf and (-oo*float(1)) is -oo + assert oo/float(1) == _inf and (oo/float(1)) is oo + assert -oo/float(1) == _ninf and (-oo/float(1)) is -oo + assert oo*float(-1) == _ninf and (oo*float(-1)) is -oo + assert -oo*float(-1) == _inf and (-oo*float(-1)) is oo + assert oo/float(-1) == _ninf and (oo/float(-1)) is -oo + assert -oo/float(-1) == _inf and (-oo/float(-1)) is oo + assert oo + float(1) == _inf and (oo + float(1)) is oo + assert -oo + float(1) == _ninf and (-oo + float(1)) is -oo + assert oo - float(1) == _inf and (oo - float(1)) is oo + assert -oo - float(1) == _ninf and (-oo - float(1)) is -oo + assert float(1)*oo == _inf and (float(1)*oo) is oo + assert float(1)*-oo == _ninf and (float(1)*-oo) is -oo + assert float(1)/oo == 0 + assert float(1)/-oo == 0 + assert float(-1)*oo == _ninf and (float(-1)*oo) is -oo + assert float(-1)*-oo == _inf and (float(-1)*-oo) is oo + assert float(-1)/oo == 0 + assert float(-1)/-oo == 0 + assert float(1) + oo is oo + assert float(1) + -oo is -oo + assert float(1) - oo is -oo + assert float(1) - -oo is oo + assert oo == float(oo) + assert (oo != float(oo)) is False + assert type(float(oo)) is float + assert -oo == float(-oo) + assert (-oo != float(-oo)) is False + assert type(float(-oo)) is float + + assert Float('nan') is nan + assert nan*1.0 is nan + assert -1.0*nan is nan + assert nan*oo is nan + assert nan*-oo is nan + assert nan/oo is nan + assert nan/-oo is nan + assert nan + oo is nan + assert nan + -oo is nan + assert nan - oo is nan + assert nan - -oo is nan + assert -oo * S.Zero is nan + + assert oo*nan is nan + assert -oo*nan is nan + assert oo/nan is nan + assert -oo/nan is nan + assert oo + nan is nan + assert -oo + nan is nan + assert oo - nan is nan + assert -oo - nan is nan + assert S.Zero * oo is nan + assert oo.is_Rational is False + assert isinstance(oo, Rational) is False + + assert S.One/oo == 0 + assert -S.One/oo == 0 + assert S.One/-oo == 0 + assert -S.One/-oo == 0 + assert S.One*oo is oo + assert -S.One*oo is -oo + assert S.One*-oo is -oo + assert -S.One*-oo is oo + assert S.One/nan is nan + assert S.One - -oo is oo + assert S.One + nan is nan + assert S.One - nan is nan + assert nan - S.One is nan + assert nan/S.One is nan + assert -oo - S.One is -oo + + +def test_Infinity_2(): + x = Symbol('x') + assert oo*x != oo + assert oo*(pi - 1) is oo + assert oo*(1 - pi) is -oo + + assert (-oo)*x != -oo + assert (-oo)*(pi - 1) is -oo + assert (-oo)*(1 - pi) is oo + + assert (-1)**S.NaN is S.NaN + assert oo - _inf is S.NaN + assert oo + _ninf is S.NaN + assert oo*0 is S.NaN + assert oo/_inf is S.NaN + assert oo/_ninf is S.NaN + assert oo**S.NaN is S.NaN + assert -oo + _inf is S.NaN + assert -oo - _ninf is S.NaN + assert -oo*S.NaN is S.NaN + assert -oo*0 is S.NaN + assert -oo/_inf is S.NaN + assert -oo/_ninf is S.NaN + assert -oo/S.NaN is S.NaN + assert abs(-oo) is oo + assert all((-oo)**i is S.NaN for i in (oo, -oo, S.NaN)) + assert (-oo)**3 is -oo + assert (-oo)**2 is oo + assert abs(S.ComplexInfinity) is oo + + +def test_Mul_Infinity_Zero(): + assert Float(0)*_inf is nan + assert Float(0)*_ninf is nan + assert Float(0)*_inf is nan + assert Float(0)*_ninf is nan + assert _inf*Float(0) is nan + assert _ninf*Float(0) is nan + assert _inf*Float(0) is nan + assert _ninf*Float(0) is nan + + +def test_Div_By_Zero(): + assert 1/S.Zero is zoo + assert 1/Float(0) is zoo + assert 0/S.Zero is nan + assert 0/Float(0) is nan + assert S.Zero/0 is nan + assert Float(0)/0 is nan + assert -1/S.Zero is zoo + assert -1/Float(0) is zoo + + +@_both_exp_pow +def test_Infinity_inequations(): + assert oo > pi + assert not (oo < pi) + assert exp(-3) < oo + + assert _inf > pi + assert not (_inf < pi) + assert exp(-3) < _inf + + raises(TypeError, lambda: oo < I) + raises(TypeError, lambda: oo <= I) + raises(TypeError, lambda: oo > I) + raises(TypeError, lambda: oo >= I) + raises(TypeError, lambda: -oo < I) + raises(TypeError, lambda: -oo <= I) + raises(TypeError, lambda: -oo > I) + raises(TypeError, lambda: -oo >= I) + + raises(TypeError, lambda: I < oo) + raises(TypeError, lambda: I <= oo) + raises(TypeError, lambda: I > oo) + raises(TypeError, lambda: I >= oo) + raises(TypeError, lambda: I < -oo) + raises(TypeError, lambda: I <= -oo) + raises(TypeError, lambda: I > -oo) + raises(TypeError, lambda: I >= -oo) + + assert oo > -oo and oo >= -oo + assert (oo < -oo) == False and (oo <= -oo) == False + assert -oo < oo and -oo <= oo + assert (-oo > oo) == False and (-oo >= oo) == False + + assert (oo < oo) == False # issue 7775 + assert (oo > oo) == False + assert (-oo > -oo) == False and (-oo < -oo) == False + assert oo >= oo and oo <= oo and -oo >= -oo and -oo <= -oo + assert (-oo < -_inf) == False + assert (oo > _inf) == False + assert -oo >= -_inf + assert oo <= _inf + + x = Symbol('x') + b = Symbol('b', finite=True, real=True) + assert (x < oo) == Lt(x, oo) # issue 7775 + assert b < oo and b > -oo and b <= oo and b >= -oo + assert oo > b and oo >= b and (oo < b) == False and (oo <= b) == False + assert (-oo > b) == False and (-oo >= b) == False and -oo < b and -oo <= b + assert (oo < x) == Lt(oo, x) and (oo > x) == Gt(oo, x) + assert (oo <= x) == Le(oo, x) and (oo >= x) == Ge(oo, x) + assert (-oo < x) == Lt(-oo, x) and (-oo > x) == Gt(-oo, x) + assert (-oo <= x) == Le(-oo, x) and (-oo >= x) == Ge(-oo, x) + + +def test_NaN(): + assert nan is nan + assert nan != 1 + assert 1*nan is nan + assert 1 != nan + assert -nan is nan + assert oo != Symbol("x")**3 + assert 2 + nan is nan + assert 3*nan + 2 is nan + assert -nan*3 is nan + assert nan + nan is nan + assert -nan + nan*(-5) is nan + assert 8/nan is nan + raises(TypeError, lambda: nan > 0) + raises(TypeError, lambda: nan < 0) + raises(TypeError, lambda: nan >= 0) + raises(TypeError, lambda: nan <= 0) + raises(TypeError, lambda: 0 < nan) + raises(TypeError, lambda: 0 > nan) + raises(TypeError, lambda: 0 <= nan) + raises(TypeError, lambda: 0 >= nan) + assert nan**0 == 1 # as per IEEE 754 + assert 1**nan is nan # IEEE 754 is not the best choice for symbolic work + # test Pow._eval_power's handling of NaN + assert Pow(nan, 0, evaluate=False)**2 == 1 + for n in (1, 1., S.One, S.NegativeOne, Float(1)): + assert n + nan is nan + assert n - nan is nan + assert nan + n is nan + assert nan - n is nan + assert n/nan is nan + assert nan/n is nan + + +def test_special_numbers(): + assert isinstance(S.NaN, Number) is True + assert isinstance(S.Infinity, Number) is True + assert isinstance(S.NegativeInfinity, Number) is True + + assert S.NaN.is_number is True + assert S.Infinity.is_number is True + assert S.NegativeInfinity.is_number is True + assert S.ComplexInfinity.is_number is True + + assert isinstance(S.NaN, Rational) is False + assert isinstance(S.Infinity, Rational) is False + assert isinstance(S.NegativeInfinity, Rational) is False + + assert S.NaN.is_rational is not True + assert S.Infinity.is_rational is not True + assert S.NegativeInfinity.is_rational is not True + + +def test_powers(): + assert integer_nthroot(1, 2) == (1, True) + assert integer_nthroot(1, 5) == (1, True) + assert integer_nthroot(2, 1) == (2, True) + assert integer_nthroot(2, 2) == (1, False) + assert integer_nthroot(2, 5) == (1, False) + assert integer_nthroot(4, 2) == (2, True) + assert integer_nthroot(123**25, 25) == (123, True) + assert integer_nthroot(123**25 + 1, 25) == (123, False) + assert integer_nthroot(123**25 - 1, 25) == (122, False) + assert integer_nthroot(1, 1) == (1, True) + assert integer_nthroot(0, 1) == (0, True) + assert integer_nthroot(0, 3) == (0, True) + assert integer_nthroot(10000, 1) == (10000, True) + assert integer_nthroot(4, 2) == (2, True) + assert integer_nthroot(16, 2) == (4, True) + assert integer_nthroot(26, 2) == (5, False) + assert integer_nthroot(1234567**7, 7) == (1234567, True) + assert integer_nthroot(1234567**7 + 1, 7) == (1234567, False) + assert integer_nthroot(1234567**7 - 1, 7) == (1234566, False) + b = 25**1000 + assert integer_nthroot(b, 1000) == (25, True) + assert integer_nthroot(b + 1, 1000) == (25, False) + assert integer_nthroot(b - 1, 1000) == (24, False) + c = 10**400 + c2 = c**2 + assert integer_nthroot(c2, 2) == (c, True) + assert integer_nthroot(c2 + 1, 2) == (c, False) + assert integer_nthroot(c2 - 1, 2) == (c - 1, False) + assert integer_nthroot(2, 10**10) == (1, False) + + p, r = integer_nthroot(int(factorial(10000)), 100) + assert p % (10**10) == 5322420655 + assert not r + + # Test that this is fast + assert integer_nthroot(2, 10**10) == (1, False) + + # output should be int if possible + assert type(integer_nthroot(2**61, 2)[0]) is int + + +def test_integer_nthroot_overflow(): + assert integer_nthroot(10**(50*50), 50) == (10**50, True) + assert integer_nthroot(10**100000, 10000) == (10**10, True) + + +def test_integer_log(): + raises(ValueError, lambda: integer_log(2, 1)) + raises(ValueError, lambda: integer_log(0, 2)) + raises(ValueError, lambda: integer_log(1.1, 2)) + raises(ValueError, lambda: integer_log(1, 2.2)) + + assert integer_log(1, 2) == (0, True) + assert integer_log(1, 3) == (0, True) + assert integer_log(2, 3) == (0, False) + assert integer_log(3, 3) == (1, True) + assert integer_log(3*2, 3) == (1, False) + assert integer_log(3**2, 3) == (2, True) + assert integer_log(3*4, 3) == (2, False) + assert integer_log(3**3, 3) == (3, True) + assert integer_log(27, 5) == (2, False) + assert integer_log(2, 3) == (0, False) + assert integer_log(-4, 2) == (2, False) + assert integer_log(-16, 4) == (0, False) + assert integer_log(-4, -2) == (2, False) + assert integer_log(4, -2) == (2, True) + assert integer_log(-8, -2) == (3, True) + assert integer_log(8, -2) == (3, False) + assert integer_log(-9, 3) == (0, False) + assert integer_log(-9, -3) == (2, False) + assert integer_log(9, -3) == (2, True) + assert integer_log(-27, -3) == (3, True) + assert integer_log(27, -3) == (3, False) + + +def test_isqrt(): + from math import sqrt as _sqrt + limit = 4503599761588223 + assert int(_sqrt(limit)) == integer_nthroot(limit, 2)[0] + assert int(_sqrt(limit + 1)) != integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + 1) == integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + S.Half) == integer_nthroot(limit, 2)[0] + assert isqrt(limit + 1 + S.Half) == integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + 2 + S.Half) == integer_nthroot(limit + 2, 2)[0] + + # Regression tests for https://github.com/sympy/sympy/issues/17034 + assert isqrt(4503599761588224) == 67108864 + assert isqrt(9999999999999999) == 99999999 + + # Other corner cases, especially involving non-integers. + raises(ValueError, lambda: isqrt(-1)) + raises(ValueError, lambda: isqrt(-10**1000)) + raises(ValueError, lambda: isqrt(Rational(-1, 2))) + + tiny = Rational(1, 10**1000) + raises(ValueError, lambda: isqrt(-tiny)) + assert isqrt(1-tiny) == 0 + assert isqrt(4503599761588224-tiny) == 67108864 + assert isqrt(10**100 - tiny) == 10**50 - 1 + + +def test_powers_Integer(): + """Test Integer._eval_power""" + # check infinity + assert S.One ** S.Infinity is S.NaN + assert S.NegativeOne** S.Infinity is S.NaN + assert S(2) ** S.Infinity is S.Infinity + assert S(-2)** S.Infinity == zoo + assert S(0) ** S.Infinity is S.Zero + + # check Nan + assert S.One ** S.NaN is S.NaN + assert S.NegativeOne ** S.NaN is S.NaN + + # check for exact roots + assert S.NegativeOne ** Rational(6, 5) == - (-1)**(S.One/5) + assert sqrt(S(4)) == 2 + assert sqrt(S(-4)) == I * 2 + assert S(16) ** Rational(1, 4) == 2 + assert S(-16) ** Rational(1, 4) == 2 * (-1)**Rational(1, 4) + assert S(9) ** Rational(3, 2) == 27 + assert S(-9) ** Rational(3, 2) == -27*I + assert S(27) ** Rational(2, 3) == 9 + assert S(-27) ** Rational(2, 3) == 9 * (S.NegativeOne ** Rational(2, 3)) + assert (-2) ** Rational(-2, 1) == Rational(1, 4) + + # not exact roots + assert sqrt(-3) == I*sqrt(3) + assert (3) ** (Rational(3, 2)) == 3 * sqrt(3) + assert (-3) ** (Rational(3, 2)) == - 3 * sqrt(-3) + assert (-3) ** (Rational(5, 2)) == 9 * I * sqrt(3) + assert (-3) ** (Rational(7, 2)) == - I * 27 * sqrt(3) + assert (2) ** (Rational(3, 2)) == 2 * sqrt(2) + assert (2) ** (Rational(-3, 2)) == sqrt(2) / 4 + assert (81) ** (Rational(2, 3)) == 9 * (S(3) ** (Rational(2, 3))) + assert (-81) ** (Rational(2, 3)) == 9 * (S(-3) ** (Rational(2, 3))) + assert (-3) ** Rational(-7, 3) == \ + -(-1)**Rational(2, 3)*3**Rational(2, 3)/27 + assert (-3) ** Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*3**Rational(1, 3)/3 + + # join roots + assert sqrt(6) + sqrt(24) == 3*sqrt(6) + assert sqrt(2) * sqrt(3) == sqrt(6) + + # separate symbols & constansts + x = Symbol("x") + assert sqrt(49 * x) == 7 * sqrt(x) + assert sqrt((3 - sqrt(pi)) ** 2) == 3 - sqrt(pi) + + # check that it is fast for big numbers + assert (2**64 + 1) ** Rational(4, 3) + assert (2**64 + 1) ** Rational(17, 25) + + # negative rational power and negative base + assert (-3) ** Rational(-7, 3) == \ + -(-1)**Rational(2, 3)*3**Rational(2, 3)/27 + assert (-3) ** Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*3**Rational(1, 3)/3 + assert (-2) ** Rational(-10, 3) == \ + (-1)**Rational(2, 3)*2**Rational(2, 3)/16 + assert abs(Pow(-2, Rational(-10, 3)).n() - + Pow(-2, Rational(-10, 3), evaluate=False).n()) < 1e-16 + + # negative base and rational power with some simplification + assert (-8) ** Rational(2, 5) == \ + 2*(-1)**Rational(2, 5)*2**Rational(1, 5) + assert (-4) ** Rational(9, 5) == \ + -8*(-1)**Rational(4, 5)*2**Rational(3, 5) + + assert S(1234).factors() == {617: 1, 2: 1} + assert Rational(2*3, 3*5*7).factors() == {2: 1, 5: -1, 7: -1} + + # test that eval_power factors numbers bigger than + # the current limit in factor_trial_division (2**15) + from sympy.ntheory.generate import nextprime + n = nextprime(2**15) + assert sqrt(n**2) == n + assert sqrt(n**3) == n*sqrt(n) + assert sqrt(4*n) == 2*sqrt(n) + + # check that factors of base with powers sharing gcd with power are removed + assert (2**4*3)**Rational(1, 6) == 2**Rational(2, 3)*3**Rational(1, 6) + assert (2**4*3)**Rational(5, 6) == 8*2**Rational(1, 3)*3**Rational(5, 6) + + # check that bases sharing a gcd are exptracted + assert 2**Rational(1, 3)*3**Rational(1, 4)*6**Rational(1, 5) == \ + 2**Rational(8, 15)*3**Rational(9, 20) + assert sqrt(8)*24**Rational(1, 3)*6**Rational(1, 5) == \ + 4*2**Rational(7, 10)*3**Rational(8, 15) + assert sqrt(8)*(-24)**Rational(1, 3)*(-6)**Rational(1, 5) == \ + 4*(-3)**Rational(8, 15)*2**Rational(7, 10) + assert 2**Rational(1, 3)*2**Rational(8, 9) == 2*2**Rational(2, 9) + assert 2**Rational(2, 3)*6**Rational(1, 3) == 2*3**Rational(1, 3) + assert 2**Rational(2, 3)*6**Rational(8, 9) == \ + 2*2**Rational(5, 9)*3**Rational(8, 9) + assert (-2)**Rational(2, S(3))*(-4)**Rational(1, S(3)) == -2*2**Rational(1, 3) + assert 3*Pow(3, 2, evaluate=False) == 3**3 + assert 3*Pow(3, Rational(-1, 3), evaluate=False) == 3**Rational(2, 3) + assert (-2)**Rational(1, 3)*(-3)**Rational(1, 4)*(-5)**Rational(5, 6) == \ + -(-1)**Rational(5, 12)*2**Rational(1, 3)*3**Rational(1, 4) * \ + 5**Rational(5, 6) + + assert Integer(-2)**Symbol('', even=True) == \ + Integer(2)**Symbol('', even=True) + assert (-1)**Float(.5) == 1.0*I + + +def test_powers_Rational(): + """Test Rational._eval_power""" + # check infinity + assert S.Half ** S.Infinity == 0 + assert Rational(3, 2) ** S.Infinity is S.Infinity + assert Rational(-1, 2) ** S.Infinity == 0 + assert Rational(-3, 2) ** S.Infinity == zoo + + # check Nan + assert Rational(3, 4) ** S.NaN is S.NaN + assert Rational(-2, 3) ** S.NaN is S.NaN + + # exact roots on numerator + assert sqrt(Rational(4, 3)) == 2 * sqrt(3) / 3 + assert Rational(4, 3) ** Rational(3, 2) == 8 * sqrt(3) / 9 + assert sqrt(Rational(-4, 3)) == I * 2 * sqrt(3) / 3 + assert Rational(-4, 3) ** Rational(3, 2) == - I * 8 * sqrt(3) / 9 + assert Rational(27, 2) ** Rational(1, 3) == 3 * (2 ** Rational(2, 3)) / 2 + assert Rational(5**3, 8**3) ** Rational(4, 3) == Rational(5**4, 8**4) + + # exact root on denominator + assert sqrt(Rational(1, 4)) == S.Half + assert sqrt(Rational(1, -4)) == I * S.Half + assert sqrt(Rational(3, 4)) == sqrt(3) / 2 + assert sqrt(Rational(3, -4)) == I * sqrt(3) / 2 + assert Rational(5, 27) ** Rational(1, 3) == (5 ** Rational(1, 3)) / 3 + + # not exact roots + assert sqrt(S.Half) == sqrt(2) / 2 + assert sqrt(Rational(-4, 7)) == I * sqrt(Rational(4, 7)) + assert Rational(-3, 2)**Rational(-7, 3) == \ + -4*(-1)**Rational(2, 3)*2**Rational(1, 3)*3**Rational(2, 3)/27 + assert Rational(-3, 2)**Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*2**Rational(2, 3)*3**Rational(1, 3)/3 + assert Rational(-3, 2)**Rational(-10, 3) == \ + 8*(-1)**Rational(2, 3)*2**Rational(1, 3)*3**Rational(2, 3)/81 + assert abs(Pow(Rational(-2, 3), Rational(-7, 4)).n() - + Pow(Rational(-2, 3), Rational(-7, 4), evaluate=False).n()) < 1e-16 + + # negative integer power and negative rational base + assert Rational(-2, 3) ** Rational(-2, 1) == Rational(9, 4) + + a = Rational(1, 10) + assert a**Float(a, 2) == Float(a, 2)**Float(a, 2) + assert Rational(-2, 3)**Symbol('', even=True) == \ + Rational(2, 3)**Symbol('', even=True) + + +def test_powers_Float(): + assert str((S('-1/10')**S('3/10')).n()) == str(Float(-.1)**(.3)) + + +def test_lshift_Integer(): + assert Integer(0) << Integer(2) == Integer(0) + assert Integer(0) << 2 == Integer(0) + assert 0 << Integer(2) == Integer(0) + + assert Integer(0b11) << Integer(0) == Integer(0b11) + assert Integer(0b11) << 0 == Integer(0b11) + assert 0b11 << Integer(0) == Integer(0b11) + + assert Integer(0b11) << Integer(2) == Integer(0b11 << 2) + assert Integer(0b11) << 2 == Integer(0b11 << 2) + assert 0b11 << Integer(2) == Integer(0b11 << 2) + + assert Integer(-0b11) << Integer(2) == Integer(-0b11 << 2) + assert Integer(-0b11) << 2 == Integer(-0b11 << 2) + assert -0b11 << Integer(2) == Integer(-0b11 << 2) + + raises(TypeError, lambda: Integer(2) << 0.0) + raises(TypeError, lambda: 0.0 << Integer(2)) + raises(ValueError, lambda: Integer(1) << Integer(-1)) + + +def test_rshift_Integer(): + assert Integer(0) >> Integer(2) == Integer(0) + assert Integer(0) >> 2 == Integer(0) + assert 0 >> Integer(2) == Integer(0) + + assert Integer(0b11) >> Integer(0) == Integer(0b11) + assert Integer(0b11) >> 0 == Integer(0b11) + assert 0b11 >> Integer(0) == Integer(0b11) + + assert Integer(0b11) >> Integer(2) == Integer(0) + assert Integer(0b11) >> 2 == Integer(0) + assert 0b11 >> Integer(2) == Integer(0) + + assert Integer(-0b11) >> Integer(2) == Integer(-1) + assert Integer(-0b11) >> 2 == Integer(-1) + assert -0b11 >> Integer(2) == Integer(-1) + + assert Integer(0b1100) >> Integer(2) == Integer(0b1100 >> 2) + assert Integer(0b1100) >> 2 == Integer(0b1100 >> 2) + assert 0b1100 >> Integer(2) == Integer(0b1100 >> 2) + + assert Integer(-0b1100) >> Integer(2) == Integer(-0b1100 >> 2) + assert Integer(-0b1100) >> 2 == Integer(-0b1100 >> 2) + assert -0b1100 >> Integer(2) == Integer(-0b1100 >> 2) + + raises(TypeError, lambda: Integer(0b10) >> 0.0) + raises(TypeError, lambda: 0.0 >> Integer(2)) + raises(ValueError, lambda: Integer(1) >> Integer(-1)) + + +def test_and_Integer(): + assert Integer(0b01010101) & Integer(0b10101010) == Integer(0) + assert Integer(0b01010101) & 0b10101010 == Integer(0) + assert 0b01010101 & Integer(0b10101010) == Integer(0) + + assert Integer(0b01010101) & Integer(0b11011011) == Integer(0b01010001) + assert Integer(0b01010101) & 0b11011011 == Integer(0b01010001) + assert 0b01010101 & Integer(0b11011011) == Integer(0b01010001) + + assert -Integer(0b01010101) & Integer(0b11011011) == Integer(-0b01010101 & 0b11011011) + assert Integer(-0b01010101) & 0b11011011 == Integer(-0b01010101 & 0b11011011) + assert -0b01010101 & Integer(0b11011011) == Integer(-0b01010101 & 0b11011011) + + assert Integer(0b01010101) & -Integer(0b11011011) == Integer(0b01010101 & -0b11011011) + assert Integer(0b01010101) & -0b11011011 == Integer(0b01010101 & -0b11011011) + assert 0b01010101 & Integer(-0b11011011) == Integer(0b01010101 & -0b11011011) + + raises(TypeError, lambda: Integer(2) & 0.0) + raises(TypeError, lambda: 0.0 & Integer(2)) + + +def test_xor_Integer(): + assert Integer(0b01010101) ^ Integer(0b11111111) == Integer(0b10101010) + assert Integer(0b01010101) ^ 0b11111111 == Integer(0b10101010) + assert 0b01010101 ^ Integer(0b11111111) == Integer(0b10101010) + + assert Integer(0b01010101) ^ Integer(0b11011011) == Integer(0b10001110) + assert Integer(0b01010101) ^ 0b11011011 == Integer(0b10001110) + assert 0b01010101 ^ Integer(0b11011011) == Integer(0b10001110) + + assert -Integer(0b01010101) ^ Integer(0b11011011) == Integer(-0b01010101 ^ 0b11011011) + assert Integer(-0b01010101) ^ 0b11011011 == Integer(-0b01010101 ^ 0b11011011) + assert -0b01010101 ^ Integer(0b11011011) == Integer(-0b01010101 ^ 0b11011011) + + assert Integer(0b01010101) ^ -Integer(0b11011011) == Integer(0b01010101 ^ -0b11011011) + assert Integer(0b01010101) ^ -0b11011011 == Integer(0b01010101 ^ -0b11011011) + assert 0b01010101 ^ Integer(-0b11011011) == Integer(0b01010101 ^ -0b11011011) + + raises(TypeError, lambda: Integer(2) ^ 0.0) + raises(TypeError, lambda: 0.0 ^ Integer(2)) + + +def test_or_Integer(): + assert Integer(0b01010101) | Integer(0b10101010) == Integer(0b11111111) + assert Integer(0b01010101) | 0b10101010 == Integer(0b11111111) + assert 0b01010101 | Integer(0b10101010) == Integer(0b11111111) + + assert Integer(0b01010101) | Integer(0b11011011) == Integer(0b11011111) + assert Integer(0b01010101) | 0b11011011 == Integer(0b11011111) + assert 0b01010101 | Integer(0b11011011) == Integer(0b11011111) + + assert -Integer(0b01010101) | Integer(0b11011011) == Integer(-0b01010101 | 0b11011011) + assert Integer(-0b01010101) | 0b11011011 == Integer(-0b01010101 | 0b11011011) + assert -0b01010101 | Integer(0b11011011) == Integer(-0b01010101 | 0b11011011) + + assert Integer(0b01010101) | -Integer(0b11011011) == Integer(0b01010101 | -0b11011011) + assert Integer(0b01010101) | -0b11011011 == Integer(0b01010101 | -0b11011011) + assert 0b01010101 | Integer(-0b11011011) == Integer(0b01010101 | -0b11011011) + + raises(TypeError, lambda: Integer(2) | 0.0) + raises(TypeError, lambda: 0.0 | Integer(2)) + + +def test_invert_Integer(): + assert ~Integer(0b01010101) == Integer(-0b01010110) + assert ~Integer(0b01010101) == Integer(~0b01010101) + assert ~(~Integer(0b01010101)) == Integer(0b01010101) + + +def test_abs1(): + assert Rational(1, 6) != Rational(-1, 6) + assert abs(Rational(1, 6)) == abs(Rational(-1, 6)) + + +def test_accept_int(): + assert not Float(4) == 4 + assert Float(4) != 4 + assert Float(4) == 4.0 + + +def test_dont_accept_str(): + assert Float("0.2") != "0.2" + assert not (Float("0.2") == "0.2") + + +def test_int(): + a = Rational(5) + assert int(a) == 5 + a = Rational(9, 10) + assert int(a) == int(-a) == 0 + assert 1/(-1)**Rational(2, 3) == -(-1)**Rational(1, 3) + # issue 10368 + a = Rational(32442016954, 78058255275) + assert type(int(a)) is type(int(-a)) is int + + +def test_int_NumberSymbols(): + assert int(Catalan) == 0 + assert int(EulerGamma) == 0 + assert int(pi) == 3 + assert int(E) == 2 + assert int(GoldenRatio) == 1 + assert int(TribonacciConstant) == 1 + for i in [Catalan, E, EulerGamma, GoldenRatio, TribonacciConstant, pi]: + a, b = i.approximation_interval(Integer) + ia = int(i) + assert ia == a + assert isinstance(ia, int) + assert b == a + 1 + assert a.is_Integer and b.is_Integer + + +def test_real_bug(): + x = Symbol("x") + assert str(2.0*x*x) in ["(2.0*x)*x", "2.0*x**2", "2.00000000000000*x**2"] + assert str(2.1*x*x) != "(2.0*x)*x" + + +def test_bug_sqrt(): + assert ((sqrt(Rational(2)) + 1)*(sqrt(Rational(2)) - 1)).expand() == 1 + + +def test_pi_Pi(): + "Test that pi (instance) is imported, but Pi (class) is not" + from sympy import pi # noqa + with raises(ImportError): + from sympy import Pi # noqa + + +def test_no_len(): + # there should be no len for numbers + raises(TypeError, lambda: len(Rational(2))) + raises(TypeError, lambda: len(Rational(2, 3))) + raises(TypeError, lambda: len(Integer(2))) + + +def test_issue_3321(): + assert sqrt(Rational(1, 5)) == Rational(1, 5)**S.Half + assert 5 * sqrt(Rational(1, 5)) == sqrt(5) + + +def test_issue_3692(): + assert ((-1)**Rational(1, 6)).expand(complex=True) == I/2 + sqrt(3)/2 + assert ((-5)**Rational(1, 6)).expand(complex=True) == \ + 5**Rational(1, 6)*I/2 + 5**Rational(1, 6)*sqrt(3)/2 + assert ((-64)**Rational(1, 6)).expand(complex=True) == I + sqrt(3) + + +def test_issue_3423(): + x = Symbol("x") + assert sqrt(x - 1).as_base_exp() == (x - 1, S.Half) + assert sqrt(x - 1) != I*sqrt(1 - x) + + +def test_issue_3449(): + x = Symbol("x") + assert sqrt(x - 1).subs(x, 5) == 2 + + +def test_issue_13890(): + x = Symbol("x") + e = (-x/4 - S.One/12)**x - 1 + f = simplify(e) + a = Rational(9, 5) + assert abs(e.subs(x,a).evalf() - f.subs(x,a).evalf()) < 1e-15 + + +def test_Integer_factors(): + def F(i): + return Integer(i).factors() + + assert F(1) == {} + assert F(2) == {2: 1} + assert F(3) == {3: 1} + assert F(4) == {2: 2} + assert F(5) == {5: 1} + assert F(6) == {2: 1, 3: 1} + assert F(7) == {7: 1} + assert F(8) == {2: 3} + assert F(9) == {3: 2} + assert F(10) == {2: 1, 5: 1} + assert F(11) == {11: 1} + assert F(12) == {2: 2, 3: 1} + assert F(13) == {13: 1} + assert F(14) == {2: 1, 7: 1} + assert F(15) == {3: 1, 5: 1} + assert F(16) == {2: 4} + assert F(17) == {17: 1} + assert F(18) == {2: 1, 3: 2} + assert F(19) == {19: 1} + assert F(20) == {2: 2, 5: 1} + assert F(21) == {3: 1, 7: 1} + assert F(22) == {2: 1, 11: 1} + assert F(23) == {23: 1} + assert F(24) == {2: 3, 3: 1} + assert F(25) == {5: 2} + assert F(26) == {2: 1, 13: 1} + assert F(27) == {3: 3} + assert F(28) == {2: 2, 7: 1} + assert F(29) == {29: 1} + assert F(30) == {2: 1, 3: 1, 5: 1} + assert F(31) == {31: 1} + assert F(32) == {2: 5} + assert F(33) == {3: 1, 11: 1} + assert F(34) == {2: 1, 17: 1} + assert F(35) == {5: 1, 7: 1} + assert F(36) == {2: 2, 3: 2} + assert F(37) == {37: 1} + assert F(38) == {2: 1, 19: 1} + assert F(39) == {3: 1, 13: 1} + assert F(40) == {2: 3, 5: 1} + assert F(41) == {41: 1} + assert F(42) == {2: 1, 3: 1, 7: 1} + assert F(43) == {43: 1} + assert F(44) == {2: 2, 11: 1} + assert F(45) == {3: 2, 5: 1} + assert F(46) == {2: 1, 23: 1} + assert F(47) == {47: 1} + assert F(48) == {2: 4, 3: 1} + assert F(49) == {7: 2} + assert F(50) == {2: 1, 5: 2} + assert F(51) == {3: 1, 17: 1} + + +def test_Rational_factors(): + def F(p, q, visual=None): + return Rational(p, q).factors(visual=visual) + + assert F(2, 3) == {2: 1, 3: -1} + assert F(2, 9) == {2: 1, 3: -2} + assert F(2, 15) == {2: 1, 3: -1, 5: -1} + assert F(6, 10) == {3: 1, 5: -1} + + +def test_issue_4107(): + assert pi*(E + 10) + pi*(-E - 10) != 0 + assert pi*(E + 10**10) + pi*(-E - 10**10) != 0 + assert pi*(E + 10**20) + pi*(-E - 10**20) != 0 + assert pi*(E + 10**80) + pi*(-E - 10**80) != 0 + + assert (pi*(E + 10) + pi*(-E - 10)).expand() == 0 + assert (pi*(E + 10**10) + pi*(-E - 10**10)).expand() == 0 + assert (pi*(E + 10**20) + pi*(-E - 10**20)).expand() == 0 + assert (pi*(E + 10**80) + pi*(-E - 10**80)).expand() == 0 + + +def test_IntegerInteger(): + a = Integer(4) + b = Integer(a) + + assert a == b + + +def test_Rational_gcd_lcm_cofactors(): + assert Integer(4).gcd(2) == Integer(2) + assert Integer(4).lcm(2) == Integer(4) + assert Integer(4).gcd(Integer(2)) == Integer(2) + assert Integer(4).lcm(Integer(2)) == Integer(4) + a, b = 720**99911, 480**12342 + assert Integer(a).lcm(b) == a*b/Integer(a).gcd(b) + + assert Integer(4).gcd(3) == Integer(1) + assert Integer(4).lcm(3) == Integer(12) + assert Integer(4).gcd(Integer(3)) == Integer(1) + assert Integer(4).lcm(Integer(3)) == Integer(12) + + assert Rational(4, 3).gcd(2) == Rational(2, 3) + assert Rational(4, 3).lcm(2) == Integer(4) + assert Rational(4, 3).gcd(Integer(2)) == Rational(2, 3) + assert Rational(4, 3).lcm(Integer(2)) == Integer(4) + + assert Integer(4).gcd(Rational(2, 9)) == Rational(2, 9) + assert Integer(4).lcm(Rational(2, 9)) == Integer(4) + + assert Rational(4, 3).gcd(Rational(2, 9)) == Rational(2, 9) + assert Rational(4, 3).lcm(Rational(2, 9)) == Rational(4, 3) + assert Rational(4, 5).gcd(Rational(2, 9)) == Rational(2, 45) + assert Rational(4, 5).lcm(Rational(2, 9)) == Integer(4) + assert Rational(5, 9).lcm(Rational(3, 7)) == Rational(Integer(5).lcm(3),Integer(9).gcd(7)) + + assert Integer(4).cofactors(2) == (Integer(2), Integer(2), Integer(1)) + assert Integer(4).cofactors(Integer(2)) == \ + (Integer(2), Integer(2), Integer(1)) + + assert Integer(4).gcd(Float(2.0)) == Float(1.0) + assert Integer(4).lcm(Float(2.0)) == Float(8.0) + assert Integer(4).cofactors(Float(2.0)) == (Float(1.0), Float(4.0), Float(2.0)) + + assert S.Half.gcd(Float(2.0)) == Float(1.0) + assert S.Half.lcm(Float(2.0)) == Float(1.0) + assert S.Half.cofactors(Float(2.0)) == \ + (Float(1.0), Float(0.5), Float(2.0)) + + +def test_Float_gcd_lcm_cofactors(): + assert Float(2.0).gcd(Integer(4)) == Float(1.0) + assert Float(2.0).lcm(Integer(4)) == Float(8.0) + assert Float(2.0).cofactors(Integer(4)) == (Float(1.0), Float(2.0), Float(4.0)) + + assert Float(2.0).gcd(S.Half) == Float(1.0) + assert Float(2.0).lcm(S.Half) == Float(1.0) + assert Float(2.0).cofactors(S.Half) == \ + (Float(1.0), Float(2.0), Float(0.5)) + + +def test_issue_4611(): + assert abs(pi._evalf(50) - 3.14159265358979) < 1e-10 + assert abs(E._evalf(50) - 2.71828182845905) < 1e-10 + assert abs(Catalan._evalf(50) - 0.915965594177219) < 1e-10 + assert abs(EulerGamma._evalf(50) - 0.577215664901533) < 1e-10 + assert abs(GoldenRatio._evalf(50) - 1.61803398874989) < 1e-10 + assert abs(TribonacciConstant._evalf(50) - 1.83928675521416) < 1e-10 + + x = Symbol("x") + assert (pi + x).evalf() == pi.evalf() + x + assert (E + x).evalf() == E.evalf() + x + assert (Catalan + x).evalf() == Catalan.evalf() + x + assert (EulerGamma + x).evalf() == EulerGamma.evalf() + x + assert (GoldenRatio + x).evalf() == GoldenRatio.evalf() + x + assert (TribonacciConstant + x).evalf() == TribonacciConstant.evalf() + x + + +@conserve_mpmath_dps +def test_conversion_to_mpmath(): + assert mpmath.mpmathify(Integer(1)) == mpmath.mpf(1) + assert mpmath.mpmathify(S.Half) == mpmath.mpf(0.5) + assert mpmath.mpmathify(Float('1.23', 15)) == mpmath.mpf('1.23') + + assert mpmath.mpmathify(I) == mpmath.mpc(1j) + + assert mpmath.mpmathify(1 + 2*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1.0 + 2*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1 + 2.0*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1.0 + 2.0*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(S.Half + S.Half*I) == mpmath.mpc(0.5 + 0.5j) + + assert mpmath.mpmathify(2*I) == mpmath.mpc(2j) + assert mpmath.mpmathify(2.0*I) == mpmath.mpc(2j) + assert mpmath.mpmathify(S.Half*I) == mpmath.mpc(0.5j) + + mpmath.mp.dps = 100 + assert mpmath.mpmathify(pi.evalf(100) + pi.evalf(100)*I) == mpmath.pi + mpmath.pi*mpmath.j + assert mpmath.mpmathify(pi.evalf(100)*I) == mpmath.pi*mpmath.j + + +def test_relational(): + # real + x = S(.1) + assert (x != cos) is True + assert (x == cos) is False + + # rational + x = Rational(1, 3) + assert (x != cos) is True + assert (x == cos) is False + + # integer defers to rational so these tests are omitted + + # number symbol + x = pi + assert (x != cos) is True + assert (x == cos) is False + + +def test_Integer_as_index(): + assert 'hello'[Integer(2):] == 'llo' + + +def test_Rational_int(): + assert int( Rational(7, 5)) == 1 + assert int( S.Half) == 0 + assert int(Rational(-1, 2)) == 0 + assert int(-Rational(7, 5)) == -1 + + +def test_zoo(): + b = Symbol('b', finite=True) + nz = Symbol('nz', nonzero=True) + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + im = Symbol('i', imaginary=True) + c = Symbol('c', complex=True) + pb = Symbol('pb', positive=True) + nb = Symbol('nb', negative=True) + imb = Symbol('ib', imaginary=True, finite=True) + for i in [I, S.Infinity, S.NegativeInfinity, S.Zero, S.One, S.Pi, S.Half, S(3), log(3), + b, nz, p, n, im, pb, nb, imb, c]: + if i.is_finite and (i.is_real or i.is_imaginary): + assert i + zoo is zoo + assert i - zoo is zoo + assert zoo + i is zoo + assert zoo - i is zoo + elif i.is_finite is not False: + assert (i + zoo).is_Add + assert (i - zoo).is_Add + assert (zoo + i).is_Add + assert (zoo - i).is_Add + else: + assert (i + zoo) is S.NaN + assert (i - zoo) is S.NaN + assert (zoo + i) is S.NaN + assert (zoo - i) is S.NaN + + if fuzzy_not(i.is_zero) and (i.is_extended_real or i.is_imaginary): + assert i*zoo is zoo + assert zoo*i is zoo + elif i.is_zero: + assert i*zoo is S.NaN + assert zoo*i is S.NaN + else: + assert (i*zoo).is_Mul + assert (zoo*i).is_Mul + + if fuzzy_not((1/i).is_zero) and (i.is_real or i.is_imaginary): + assert zoo/i is zoo + elif (1/i).is_zero: + assert zoo/i is S.NaN + elif i.is_zero: + assert zoo/i is zoo + else: + assert (zoo/i).is_Mul + + assert (I*oo).is_Mul # allow directed infinity + assert zoo + zoo is S.NaN + assert zoo * zoo is zoo + assert zoo - zoo is S.NaN + assert zoo/zoo is S.NaN + assert zoo**zoo is S.NaN + assert zoo**0 is S.One + assert zoo**2 is zoo + assert 1/zoo is S.Zero + + assert Mul.flatten([S.NegativeOne, oo, S(0)]) == ([S.NaN], [], None) + + +def test_issue_4122(): + x = Symbol('x', nonpositive=True) + assert oo + x is oo + x = Symbol('x', extended_nonpositive=True) + assert (oo + x).is_Add + x = Symbol('x', finite=True) + assert (oo + x).is_Add # x could be imaginary + x = Symbol('x', nonnegative=True) + assert oo + x is oo + x = Symbol('x', extended_nonnegative=True) + assert oo + x is oo + x = Symbol('x', finite=True, real=True) + assert oo + x is oo + + # similarly for negative infinity + x = Symbol('x', nonnegative=True) + assert -oo + x is -oo + x = Symbol('x', extended_nonnegative=True) + assert (-oo + x).is_Add + x = Symbol('x', finite=True) + assert (-oo + x).is_Add + x = Symbol('x', nonpositive=True) + assert -oo + x is -oo + x = Symbol('x', extended_nonpositive=True) + assert -oo + x is -oo + x = Symbol('x', finite=True, real=True) + assert -oo + x is -oo + + +def test_GoldenRatio_expand(): + assert GoldenRatio.expand(func=True) == S.Half + sqrt(5)/2 + + +def test_TribonacciConstant_expand(): + assert TribonacciConstant.expand(func=True) == \ + (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + +def test_as_content_primitive(): + assert S.Zero.as_content_primitive() == (1, 0) + assert S.Half.as_content_primitive() == (S.Half, 1) + assert (Rational(-1, 2)).as_content_primitive() == (S.Half, -1) + assert S(3).as_content_primitive() == (3, 1) + assert S(3.1).as_content_primitive() == (1, 3.1) + + +def test_hashing_sympy_integers(): + # Test for issue 5072 + assert {Integer(3)} == {int(3)} + assert hash(Integer(4)) == hash(int(4)) + + +def test_rounding_issue_4172(): + assert int((E**100).round()) == \ + 26881171418161354484126255515800135873611119 + assert int((pi**100).round()) == \ + 51878483143196131920862615246303013562686760680406 + assert int((Rational(1)/EulerGamma**100).round()) == \ + 734833795660954410469466 + + +@XFAIL +def test_mpmath_issues(): + from mpmath.libmp.libmpf import _normalize + import mpmath.libmp as mlib + rnd = mlib.round_nearest + mpf = (0, int(0), -123, -1, 53, rnd) # nan + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + mpf = (0, int(0), -456, -2, 53, rnd) # +inf + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + mpf = (1, int(0), -789, -3, 53, rnd) # -inf + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + + from mpmath.libmp.libmpf import fnan + assert mlib.mpf_eq(fnan, fnan) + + +def test_Catalan_EulerGamma_prec(): + n = GoldenRatio + f = Float(n.n(), 5) + assert f._mpf_ == (0, int(212079), -17, 18) + assert f._prec == 20 + assert n._as_mpf_val(20) == f._mpf_ + + n = EulerGamma + f = Float(n.n(), 5) + assert f._mpf_ == (0, int(302627), -19, 19) + assert f._prec == 20 + assert n._as_mpf_val(20) == f._mpf_ + + +def test_Catalan_rewrite(): + k = Dummy('k', integer=True, nonnegative=True) + assert Catalan.rewrite(Sum).dummy_eq( + Sum((-1)**k/(2*k + 1)**2, (k, 0, oo))) + assert Catalan.rewrite() == Catalan + + +def test_bool_eq(): + assert 0 == False + assert S(0) == False + assert S(0) != S.false + assert 1 == True + assert S.One == True + assert S.One != S.true + + +def test_Float_eq(): + # Floats with different precision should not compare equal + assert Float(.5, 10) != Float(.5, 11) != Float(.5, 1) + # but floats that aren't exact in base-2 still + # don't compare the same because they have different + # underlying mpf values + assert Float(.12, 3) != Float(.12, 4) + assert Float(.12, 3) != .12 + assert 0.12 != Float(.12, 3) + assert Float('.12', 22) != .12 + # issue 11707 + # but Float/Rational -- except for 0 -- + # are exact so Rational(x) = Float(y) only if + # Rational(x) == Rational(Float(y)) + assert Float('1.1') != Rational(11, 10) + assert Rational(11, 10) != Float('1.1') + # coverage + assert not Float(3) == 2 + assert not Float(3) == Float(2) + assert not Float(3) == 3 + assert not Float(2**2) == S.Half + assert Float(2**2) == 4.0 + assert not Float(2**-2) == 1 + assert Float(2**-1) == 0.5 + assert not Float(2*3) == 3 + assert not Float(2*3) == 0.5 + assert Float(2*3) == 6.0 + assert not Float(2*3) == 6 + assert not Float(2*3) == 8 + assert not Float(.75) == Rational(3, 4) + assert Float(.75) == 0.75 + assert Float(5/18) == 5/18 + # 4473 + assert Float(2.) != 3 + assert not Float((0,1,-3)) == S.One/8 + assert Float((0,1,-3)) == 1/8 + assert Float((0,1,-3)) != S.One/9 + # 16196 + assert not 2 == Float(2) # unlike Python + assert t**2 != t**2.0 + + +def test_issue_6640(): + from mpmath.libmp.libmpf import finf, fninf + # fnan is not included because Float no longer returns fnan, + # but otherwise, the same sort of test could apply + assert Float(finf).is_zero is False + assert Float(fninf).is_zero is False + assert bool(Float(0)) is False + + +def test_issue_6349(): + assert Float('23.e3', '')._prec == 10 + assert Float('23e3', '')._prec == 20 + assert Float('23000', '')._prec == 20 + assert Float('-23000', '')._prec == 20 + + +def test_mpf_norm(): + assert mpf_norm((1, 0, 1, 0), 10) == mpf('0')._mpf_ + assert Float._new((1, 0, 1, 0), 10)._mpf_ == mpf('0')._mpf_ + + +def test_latex(): + assert latex(pi) == r"\pi" + assert latex(E) == r"e" + assert latex(GoldenRatio) == r"\phi" + assert latex(TribonacciConstant) == r"\text{TribonacciConstant}" + assert latex(EulerGamma) == r"\gamma" + assert latex(oo) == r"\infty" + assert latex(-oo) == r"-\infty" + assert latex(zoo) == r"\tilde{\infty}" + assert latex(nan) == r"\text{NaN}" + assert latex(I) == r"i" + + +def test_issue_7742(): + assert -oo % 1 is nan + + +def test_simplify_AlgebraicNumber(): + A = AlgebraicNumber + e = 3**(S.One/6)*(3 + (135 + 78*sqrt(3))**Rational(2, 3))/(45 + 26*sqrt(3))**(S.One/3) + assert simplify(A(e)) == A(12) # wester test_C20 + + e = (41 + 29*sqrt(2))**(S.One/5) + assert simplify(A(e)) == A(1 + sqrt(2)) # wester test_C21 + + e = (3 + 4*I)**Rational(3, 2) + assert simplify(A(e)) == A(2 + 11*I) # issue 4401 + + +def test_Float_idempotence(): + x = Float('1.23', '') + y = Float(x) + z = Float(x, 15) + assert same_and_same_prec(y, x) + assert not same_and_same_prec(z, x) + x = Float(10**20) + y = Float(x) + z = Float(x, 15) + assert same_and_same_prec(y, x) + assert not same_and_same_prec(z, x) + + +def test_comp1(): + # sqrt(2) = 1.414213 5623730950... + a = sqrt(2).n(7) + assert comp(a, 1.4142129) is False + assert comp(a, 1.4142130) + # ... + assert comp(a, 1.4142141) + assert comp(a, 1.4142142) is False + assert comp(sqrt(2).n(2), '1.4') + assert comp(sqrt(2).n(2), Float(1.4, 2), '') + assert comp(sqrt(2).n(2), 1.4, '') + assert comp(sqrt(2).n(2), Float(1.4, 3), '') is False + assert comp(sqrt(2) + sqrt(3)*I, 1.4 + 1.7*I, .1) + assert not comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*0.89, .1) + assert comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*0.90, .1) + assert comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*1.07, .1) + assert not comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*1.08, .1) + assert [(i, j) + for i in range(130, 150) + for j in range(170, 180) + if comp((sqrt(2)+ I*sqrt(3)).n(3), i/100. + I*j/100.)] == [ + (141, 173), (142, 173)] + raises(ValueError, lambda: comp(t, '1')) + raises(ValueError, lambda: comp(t, 1)) + assert comp(0, 0.0) + assert comp(.5, S.Half) + assert comp(2 + sqrt(2), 2.0 + sqrt(2)) + assert not comp(0, 1) + assert not comp(2, sqrt(2)) + assert not comp(2 + I, 2.0 + sqrt(2)) + assert not comp(2.0 + sqrt(2), 2 + I) + assert not comp(2.0 + sqrt(2), sqrt(3)) + assert comp(1/pi.n(4), 0.3183, 1e-5) + assert not comp(1/pi.n(4), 0.3183, 8e-6) + + +def test_issue_9491(): + assert oo**zoo is nan + + +def test_issue_10063(): + assert 2**Float(3) == Float(8) + + +def test_issue_10020(): + assert oo**I is S.NaN + assert oo**(1 + I) is S.ComplexInfinity + assert oo**(-1 + I) is S.Zero + assert (-oo)**I is S.NaN + assert (-oo)**(-1 + I) is S.Zero + assert oo**t == Pow(oo, t, evaluate=False) + assert (-oo)**t == Pow(-oo, t, evaluate=False) + + +def test_invert_numbers(): + assert S(2).invert(5) == 3 + assert S(2).invert(Rational(5, 2)) == S.Half + assert S(2).invert(5.) == S.Half + assert S(2).invert(S(5)) == 3 + assert S(2.).invert(5) == 0.5 + assert S(sqrt(2)).invert(5) == 1/sqrt(2) + assert S(sqrt(2)).invert(sqrt(3)) == 1/sqrt(2) + + +def test_mod_inverse(): + assert mod_inverse(3, 11) == 4 + assert mod_inverse(5, 11) == 9 + assert mod_inverse(21124921, 521512) == 7713 + assert mod_inverse(124215421, 5125) == 2981 + assert mod_inverse(214, 12515) == 1579 + assert mod_inverse(5823991, 3299) == 1442 + assert mod_inverse(123, 44) == 39 + assert mod_inverse(2, 5) == 3 + assert mod_inverse(-2, 5) == 2 + assert mod_inverse(2, -5) == -2 + assert mod_inverse(-2, -5) == -3 + assert mod_inverse(-3, -7) == -5 + x = Symbol('x') + assert S(2).invert(x) == S.Half + raises(TypeError, lambda: mod_inverse(2, x)) + raises(ValueError, lambda: mod_inverse(2, S.Half)) + raises(ValueError, lambda: mod_inverse(2, cos(1)**2 + sin(1)**2)) + + +def test_golden_ratio_rewrite_as_sqrt(): + assert GoldenRatio.rewrite(sqrt) == S.Half + sqrt(5)*S.Half + + +def test_tribonacci_constant_rewrite_as_sqrt(): + assert TribonacciConstant.rewrite(sqrt) == \ + (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + +def test_comparisons_with_unknown_type(): + class Foo: + """ + Class that is unaware of Basic, and relies on both classes returning + the NotImplemented singleton for equivalence to evaluate to False. + + """ + + ni, nf, nr = Integer(3), Float(1.0), Rational(1, 3) + foo = Foo() + + for n in ni, nf, nr, oo, -oo, zoo, nan: + assert n != foo + assert foo != n + assert not n == foo + assert not foo == n + raises(TypeError, lambda: n < foo) + raises(TypeError, lambda: foo > n) + raises(TypeError, lambda: n > foo) + raises(TypeError, lambda: foo < n) + raises(TypeError, lambda: n <= foo) + raises(TypeError, lambda: foo >= n) + raises(TypeError, lambda: n >= foo) + raises(TypeError, lambda: foo <= n) + + class Bar: + """ + Class that considers itself equal to any instance of Number except + infinities and nans, and relies on SymPy types returning the + NotImplemented singleton for symmetric equality relations. + + """ + def __eq__(self, other): + if other in (oo, -oo, zoo, nan): + return False + if isinstance(other, Number): + return True + return NotImplemented + + def __ne__(self, other): + return not self == other + + bar = Bar() + + for n in ni, nf, nr: + assert n == bar + assert bar == n + assert not n != bar + assert not bar != n + + for n in oo, -oo, zoo, nan: + assert n != bar + assert bar != n + assert not n == bar + assert not bar == n + + for n in ni, nf, nr, oo, -oo, zoo, nan: + raises(TypeError, lambda: n < bar) + raises(TypeError, lambda: bar > n) + raises(TypeError, lambda: n > bar) + raises(TypeError, lambda: bar < n) + raises(TypeError, lambda: n <= bar) + raises(TypeError, lambda: bar >= n) + raises(TypeError, lambda: n >= bar) + raises(TypeError, lambda: bar <= n) + + +def test_NumberSymbol_comparison(): + from sympy.core.tests.test_relational import rel_check + rpi = Rational('905502432259640373/288230376151711744') + fpi = Float(float(pi)) + assert rel_check(rpi, fpi) + + +def test_Integer_precision(): + # Make sure Integer inputs for keyword args work + assert Float('1.0', dps=Integer(15))._prec == 53 + assert Float('1.0', precision=Integer(15))._prec == 15 + assert type(Float('1.0', precision=Integer(15))._prec) == int + assert sympify(srepr(Float('1.0', precision=15))) == Float('1.0', precision=15) + + +def test_numpy_to_float(): + from sympy.testing.pytest import skip + from sympy.external import import_module + np = import_module('numpy') + if not np: + skip('numpy not installed. Abort numpy tests.') + + def check_prec_and_relerr(npval, ratval): + prec = np.finfo(npval).nmant + 1 + x = Float(npval) + assert x._prec == prec + y = Float(ratval, precision=prec) + assert abs((x - y)/y) < 2**(-(prec + 1)) + + check_prec_and_relerr(np.float16(2.0/3), Rational(2, 3)) + check_prec_and_relerr(np.float32(2.0/3), Rational(2, 3)) + check_prec_and_relerr(np.float64(2.0/3), Rational(2, 3)) + # extended precision, on some arch/compilers: + x = np.longdouble(2)/3 + check_prec_and_relerr(x, Rational(2, 3)) + y = Float(x, precision=10) + assert same_and_same_prec(y, Float(Rational(2, 3), precision=10)) + + raises(TypeError, lambda: Float(np.complex64(1+2j))) + raises(TypeError, lambda: Float(np.complex128(1+2j))) + + +def test_Integer_ceiling_floor(): + a = Integer(4) + + assert a.floor() == a + assert a.ceiling() == a + + +def test_ComplexInfinity(): + assert zoo.floor() is zoo + assert zoo.ceiling() is zoo + assert zoo**zoo is S.NaN + + +def test_Infinity_floor_ceiling_power(): + assert oo.floor() is oo + assert oo.ceiling() is oo + assert oo**S.NaN is S.NaN + assert oo**zoo is S.NaN + + +def test_One_power(): + assert S.One**12 is S.One + assert S.NegativeOne**S.NaN is S.NaN + + +def test_NegativeInfinity(): + assert (-oo).floor() is -oo + assert (-oo).ceiling() is -oo + assert (-oo)**11 is -oo + assert (-oo)**12 is oo + + +def test_issue_6133(): + raises(TypeError, lambda: (-oo < None)) + raises(TypeError, lambda: (S(-2) < None)) + raises(TypeError, lambda: (oo < None)) + raises(TypeError, lambda: (oo > None)) + raises(TypeError, lambda: (S(2) < None)) + + +def test_abc(): + x = numbers.Float(5) + assert(isinstance(x, nums.Number)) + assert(isinstance(x, numbers.Number)) + assert(isinstance(x, nums.Real)) + y = numbers.Rational(1, 3) + assert(isinstance(y, nums.Number)) + assert(y.numerator == 1) + assert(y.denominator == 3) + assert(isinstance(y, nums.Rational)) + z = numbers.Integer(3) + assert(isinstance(z, nums.Number)) + assert(isinstance(z, numbers.Number)) + assert(isinstance(z, nums.Rational)) + assert(isinstance(z, numbers.Rational)) + assert(isinstance(z, nums.Integral)) + + +def test_floordiv(): + assert S(2)//S.Half == 4 + + +def test_negation(): + assert -S.Zero is S.Zero + assert -Float(0) is not S.Zero and -Float(0) == 0.0 + + +def test_exponentiation_of_0(): + x = Symbol('x') + assert 0**-x == zoo**x + assert unchanged(Pow, 0, x) + x = Symbol('x', zero=True) + assert 0**-x == S.One + assert 0**x == S.One + + +def test_int_valued(): + x = Symbol('x') + assert int_valued(x) == False + assert int_valued(S.Half) == False + assert int_valued(S.One) == True + assert int_valued(Float(1)) == True + assert int_valued(Float(1.1)) == False + assert int_valued(pi) == False + + +def test_equal_valued(): + x = Symbol('x') + + equal_values = [ + [1, 1.0, S(1), S(1.0), S(1).n(5)], + [2, 2.0, S(2), S(2.0), S(2).n(5)], + [-1, -1.0, -S(1), -S(1.0), -S(1).n(5)], + [0.5, S(0.5), S(1)/2], + [-0.5, -S(0.5), -S(1)/2], + [0, 0.0, S(0), S(0.0), S(0).n()], + [pi], [pi.n()], # <-- not equal + [S(1)/10], [0.1, S(0.1)], # <-- not equal + [S(0.1).n(5)], + [oo], + [cos(x/2)], [cos(0.5*x)], # <-- no recursion + ] + + for m, values_m in enumerate(equal_values): + for value_i in values_m: + + # All values in same list equal + for value_j in values_m: + assert equal_valued(value_i, value_j) is True + + # Not equal to anything in any other list: + for n, values_n in enumerate(equal_values): + if n == m: + continue + for value_j in values_n: + assert equal_valued(value_i, value_j) is False + + +def test_all_close(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + assert all_close(2, 2) is True + assert all_close(2, 2.0000) is True + assert all_close(2, 2.0001) is False + assert all_close(1/3, 1/3.0001) is False + assert all_close(1/3, 1/3.0001, 1e-3, 1e-3) is True + assert all_close(1/3, Rational(1, 3)) is True + assert all_close(0.1*exp(0.2*x), exp(x/5)/10) is True + # The expressions should be structurally the same modulo identity: + assert all_close(1.4142135623730951, sqrt(2)) is False + assert all_close(1.4142135623730951, sqrt(2).evalf()) is True + assert all_close(x + 1e-20, x) is True + # We should be able to match terms of an Add/Mul in any order + assert all_close(Add(1, 2, evaluate=False), Add(2, 1, evaluate=False)) + # coverage + assert not all_close(2*x, 3*x) + assert all_close(2*x, 3*x, 1) + assert not all_close(2*x, 3*x, 0, 0.5) + assert all_close(2*x, 3*x, 0, 1) + assert not all_close(y*x, z*x) + assert all_close(2*x*exp(1.0*x), 2.0*x*exp(x)) + assert not all_close(2*x*exp(1.0*x), 2.0*x*exp(2.*x)) + assert all_close(x + 2.*y, 1.*x + 2*y) + assert all_close(x + exp(2.*x)*y, 1.*x + exp(2*x)*y) + assert not all_close(x + exp(2.*x)*y, 1.*x + 2*exp(2*x)*y) + assert not all_close(x + exp(2.*x)*y, 1.*x + exp(3*x)*y) + assert not all_close(x + 2.*y, 1.*x + 3*y) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_operations.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_operations.py new file mode 100644 index 0000000000000000000000000000000000000000..c60d691ef00ee9601ada04ef68e2db37794a81ad --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_operations.py @@ -0,0 +1,110 @@ +from sympy.core.expr import Expr +from sympy.core.numbers import Integer +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.operations import AssocOp, LatticeOp +from sympy.testing.pytest import raises +from sympy.core.sympify import SympifyError +from sympy.core.add import Add, add +from sympy.core.mul import Mul, mul + +# create the simplest possible Lattice class + + +class join(LatticeOp): + zero = Integer(0) + identity = Integer(1) + + +def test_lattice_simple(): + assert join(join(2, 3), 4) == join(2, join(3, 4)) + assert join(2, 3) == join(3, 2) + assert join(0, 2) == 0 + assert join(1, 2) == 2 + assert join(2, 2) == 2 + + assert join(join(2, 3), 4) == join(2, 3, 4) + assert join() == 1 + assert join(4) == 4 + assert join(1, 4, 2, 3, 1, 3, 2) == join(2, 3, 4) + + +def test_lattice_shortcircuit(): + raises(SympifyError, lambda: join(object)) + assert join(0, object) == 0 + + +def test_lattice_print(): + assert str(join(5, 4, 3, 2)) == 'join(2, 3, 4, 5)' + + +def test_lattice_make_args(): + assert join.make_args(join(2, 3, 4)) == {S(2), S(3), S(4)} + assert join.make_args(0) == {0} + assert list(join.make_args(0))[0] is S.Zero + assert Add.make_args(0)[0] is S.Zero + + +def test_issue_14025(): + a, b, c, d = symbols('a,b,c,d', commutative=False) + assert Mul(a, b, c).has(c*b) == False + assert Mul(a, b, c).has(b*c) == True + assert Mul(a, b, c, d).has(b*c*d) == True + + +def test_AssocOp_flatten(): + a, b, c, d = symbols('a,b,c,d') + + class MyAssoc(AssocOp): + identity = S.One + + assert MyAssoc(a, MyAssoc(b, c)).args == \ + MyAssoc(MyAssoc(a, b), c).args == \ + MyAssoc(MyAssoc(a, b, c)).args == \ + MyAssoc(a, b, c).args == \ + (a, b, c) + u = MyAssoc(b, c) + v = MyAssoc(u, d, evaluate=False) + assert v.args == (u, d) + # like Add, any unevaluated outer call will flatten inner args + assert MyAssoc(a, v).args == (a, b, c, d) + + +def test_add_dispatcher(): + + class NewBase(Expr): + @property + def _add_handler(self): + return NewAdd + class NewAdd(NewBase, Add): + pass + add.register_handlerclass((Add, NewAdd), NewAdd) + + a, b = Symbol('a'), NewBase() + + # Add called as fallback + assert add(1, 2) == Add(1, 2) + assert add(a, a) == Add(a, a) + + # selection by registered priority + assert add(a,b,a) == NewAdd(2*a, b) + + +def test_mul_dispatcher(): + + class NewBase(Expr): + @property + def _mul_handler(self): + return NewMul + class NewMul(NewBase, Mul): + pass + mul.register_handlerclass((Mul, NewMul), NewMul) + + a, b = Symbol('a'), NewBase() + + # Mul called as fallback + assert mul(1, 2) == Mul(1, 2) + assert mul(a, a) == Mul(a, a) + + # selection by registered priority + assert mul(a,b,a) == NewMul(a**2, b) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py new file mode 100644 index 0000000000000000000000000000000000000000..21e03d717872a9a8165ceeebf7ef58e9842702c0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py @@ -0,0 +1,126 @@ +from sympy.abc import x, y +from sympy.core.parameters import evaluate +from sympy.core import Mul, Add, Pow, S +from sympy.core.numbers import oo +from sympy.functions.elementary.miscellaneous import sqrt + +def test_add(): + with evaluate(False): + p = oo - oo + assert isinstance(p, Add) and p.args == (oo, -oo) + p = 5 - oo + assert isinstance(p, Add) and p.args == (-oo, 5) + p = oo - 5 + assert isinstance(p, Add) and p.args == (oo, -5) + p = oo + 5 + assert isinstance(p, Add) and p.args == (oo, 5) + p = 5 + oo + assert isinstance(p, Add) and p.args == (oo, 5) + p = -oo + 5 + assert isinstance(p, Add) and p.args == (-oo, 5) + p = -5 - oo + assert isinstance(p, Add) and p.args == (-oo, -5) + + with evaluate(False): + expr = x + x + assert isinstance(expr, Add) + assert expr.args == (x, x) + + with evaluate(True): + assert (x + x).args == (2, x) + + assert (x + x).args == (x, x) + + assert isinstance(x + x, Mul) + + with evaluate(False): + assert S.One + 1 == Add(1, 1) + assert 1 + S.One == Add(1, 1) + + assert S(4) - 3 == Add(4, -3) + assert -3 + S(4) == Add(4, -3) + + assert S(2) * 4 == Mul(2, 4) + assert 4 * S(2) == Mul(2, 4) + + assert S(6) / 3 == Mul(6, Pow(3, -1)) + assert S.One / 3 * 6 == Mul(S.One / 3, 6) + + assert 9 ** S(2) == Pow(9, 2) + assert S(2) ** 9 == Pow(2, 9) + + assert S(2) / 2 == Mul(2, Pow(2, -1)) + assert S.One / 2 * 2 == Mul(S.One / 2, 2) + + assert S(2) / 3 + 1 == Add(S(2) / 3, 1) + assert 1 + S(2) / 3 == Add(1, S(2) / 3) + + assert S(4) / 7 - 3 == Add(S(4) / 7, -3) + assert -3 + S(4) / 7 == Add(-3, S(4) / 7) + + assert S(2) / 4 * 4 == Mul(S(2) / 4, 4) + assert 4 * (S(2) / 4) == Mul(4, S(2) / 4) + + assert S(6) / 3 == Mul(6, Pow(3, -1)) + assert S.One / 3 * 6 == Mul(S.One / 3, 6) + + assert S.One / 3 + sqrt(3) == Add(S.One / 3, sqrt(3)) + assert sqrt(3) + S.One / 3 == Add(sqrt(3), S.One / 3) + + assert S.One / 2 * 10.333 == Mul(S.One / 2, 10.333) + assert 10.333 * (S.One / 2) == Mul(10.333, S.One / 2) + + assert sqrt(2) * sqrt(2) == Mul(sqrt(2), sqrt(2)) + + assert S.One / 2 + x == Add(S.One / 2, x) + assert x + S.One / 2 == Add(x, S.One / 2) + + assert S.One / x * x == Mul(S.One / x, x) + assert x * (S.One / x) == Mul(x, Pow(x, -1)) + + assert S.One / 3 == Pow(3, -1) + assert S.One / x == Pow(x, -1) + assert 1 / S(3) == Pow(3, -1) + assert 1 / x == Pow(x, -1) + +def test_nested(): + with evaluate(False): + expr = (x + x) + (y + y) + assert expr.args == ((x + x), (y + y)) + assert expr.args[0].args == (x, x) + +def test_reentrantcy(): + with evaluate(False): + expr = x + x + assert expr.args == (x, x) + with evaluate(True): + expr = x + x + assert expr.args == (2, x) + expr = x + x + assert expr.args == (x, x) + +def test_reusability(): + f = evaluate(False) + + with f: + expr = x + x + assert expr.args == (x, x) + + expr = x + x + assert expr.args == (2, x) + + with f: + expr = x + x + assert expr.args == (x, x) + + # Assure reentrancy with reusability + ctx = evaluate(False) + with ctx: + expr = x + x + assert expr.args == (x, x) + with ctx: + expr = x + x + assert expr.args == (x, x) + + expr = x + x + assert expr.args == (2, x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_power.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_power.py new file mode 100644 index 0000000000000000000000000000000000000000..80ae48c525c20da6153deffbc9feadef81acf527 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_power.py @@ -0,0 +1,670 @@ +from sympy.core import ( + Basic, Rational, Symbol, S, Float, Integer, Mul, Number, Pow, + Expr, I, nan, pi, symbols, oo, zoo, N) +from sympy.core.parameters import global_parameters +from sympy.core.tests.test_evalf import NS +from sympy.core.function import expand_multinomial +from sympy.functions.elementary.miscellaneous import sqrt, cbrt +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.special.error_functions import erf +from sympy.functions.elementary.trigonometric import ( + sin, cos, tan, sec, csc, atan) +from sympy.functions.elementary.hyperbolic import cosh, sinh, tanh +from sympy.polys import Poly +from sympy.series.order import O +from sympy.sets import FiniteSet +from sympy.core.power import power +from sympy.core.intfunc import integer_nthroot +from sympy.testing.pytest import warns, _both_exp_pow +from sympy.utilities.exceptions import SymPyDeprecationWarning +from sympy.abc import a, b, c, x, y +from sympy.core.numbers import all_close + +def test_rational(): + a = Rational(1, 5) + + r = sqrt(5)/5 + assert sqrt(a) == r + assert 2*sqrt(a) == 2*r + + r = a*a**S.Half + assert a**Rational(3, 2) == r + assert 2*a**Rational(3, 2) == 2*r + + r = a**5*a**Rational(2, 3) + assert a**Rational(17, 3) == r + assert 2 * a**Rational(17, 3) == 2*r + + +def test_large_rational(): + e = (Rational(123712**12 - 1, 7) + Rational(1, 7))**Rational(1, 3) + assert e == 234232585392159195136 * (Rational(1, 7)**Rational(1, 3)) + + +def test_negative_real(): + def feq(a, b): + return abs(a - b) < 1E-10 + + assert feq(S.One / Float(-0.5), -Integer(2)) + + +def test_expand(): + assert (2**(-1 - x)).expand() == S.Half*2**(-x) + + +def test_issue_3449(): + #test if powers are simplified correctly + #see also issue 3995 + assert ((x**Rational(1, 3))**Rational(2)) == x**Rational(2, 3) + assert ( + (x**Rational(3))**Rational(2, 5)) == (x**Rational(3))**Rational(2, 5) + + a = Symbol('a', real=True) + b = Symbol('b', real=True) + assert (a**2)**b == (abs(a)**b)**2 + assert sqrt(1/a) != 1/sqrt(a) # e.g. for a = -1 + assert (a**3)**Rational(1, 3) != a + assert (x**a)**b != x**(a*b) # e.g. x = -1, a=2, b=1/2 + assert (x**.5)**b == x**(.5*b) + assert (x**.5)**.5 == x**.25 + assert (x**2.5)**.5 != x**1.25 # e.g. for x = 5*I + + k = Symbol('k', integer=True) + m = Symbol('m', integer=True) + assert (x**k)**m == x**(k*m) + assert Number(5)**Rational(2, 3) == Number(25)**Rational(1, 3) + + assert (x**.5)**2 == x**1.0 + assert (x**2)**k == (x**k)**2 == x**(2*k) + + a = Symbol('a', positive=True) + assert (a**3)**Rational(2, 5) == a**Rational(6, 5) + assert (a**2)**b == (a**b)**2 + assert (a**Rational(2, 3))**x == a**(x*Rational(2, 3)) != (a**x)**Rational(2, 3) + + +def test_issue_3866(): + assert --sqrt(sqrt(5) - 1) == sqrt(sqrt(5) - 1) + + +def test_negative_one(): + x = Symbol('x', complex=True) + y = Symbol('y', complex=True) + assert 1/x**y == x**(-y) + + +def test_issue_4362(): + neg = Symbol('neg', negative=True) + nonneg = Symbol('nonneg', nonnegative=True) + any = Symbol('any') + num, den = sqrt(1/neg).as_numer_denom() + assert num == sqrt(-1) + assert den == sqrt(-neg) + num, den = sqrt(1/nonneg).as_numer_denom() + assert num == 1 + assert den == sqrt(nonneg) + num, den = sqrt(1/any).as_numer_denom() + assert num == sqrt(1/any) + assert den == 1 + + def eqn(num, den, pow): + return (num/den)**pow + npos = 1 + nneg = -1 + dpos = 2 - sqrt(3) + dneg = 1 - sqrt(3) + assert dpos > 0 and dneg < 0 and npos > 0 and nneg < 0 + # pos or neg integer + eq = eqn(npos, dpos, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2) + eq = eqn(npos, dneg, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2) + eq = eqn(nneg, dpos, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2) + eq = eqn(nneg, dneg, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2) + eq = eqn(npos, dpos, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1) + eq = eqn(npos, dneg, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1) + eq = eqn(nneg, dpos, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1) + eq = eqn(nneg, dneg, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1) + # pos or neg rational + pow = S.Half + eq = eqn(npos, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow) + eq = eqn(npos, dneg, pow) + assert eq.is_Pow is False and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow) + eq = eqn(nneg, dpos, pow) + assert not eq.is_Pow or eq.as_numer_denom() == (nneg**pow, dpos**pow) + eq = eqn(nneg, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow) + eq = eqn(npos, dpos, -pow) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, npos**pow) + eq = eqn(npos, dneg, -pow) + assert eq.is_Pow is False and eq.as_numer_denom() == (-(-npos)**pow*(-dneg)**pow, npos) + eq = eqn(nneg, dpos, -pow) + assert not eq.is_Pow or eq.as_numer_denom() == (dpos**pow, nneg**pow) + eq = eqn(nneg, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow) + # unknown exponent + pow = 2*any + eq = eqn(npos, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow) + eq = eqn(npos, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow) + eq = eqn(nneg, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (nneg**pow, dpos**pow) + eq = eqn(nneg, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow) + eq = eqn(npos, dpos, -pow) + assert eq.as_numer_denom() == (dpos**pow, npos**pow) + eq = eqn(npos, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-npos)**pow) + eq = eqn(nneg, dpos, -pow) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, nneg**pow) + eq = eqn(nneg, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow) + + assert ((1/(1 + x/3))**(-S.One)).as_numer_denom() == (3 + x, 3) + notp = Symbol('notp', positive=False) # not positive does not imply real + b = ((1 + x/notp)**-2) + assert (b**(-y)).as_numer_denom() == (1, b**y) + assert (b**(-S.One)).as_numer_denom() == ((notp + x)**2, notp**2) + nonp = Symbol('nonp', nonpositive=True) + assert (((1 + x/nonp)**-2)**(-S.One)).as_numer_denom() == ((-nonp - + x)**2, nonp**2) + + n = Symbol('n', negative=True) + assert (x**n).as_numer_denom() == (1, x**-n) + assert sqrt(1/n).as_numer_denom() == (S.ImaginaryUnit, sqrt(-n)) + n = Symbol('0 or neg', nonpositive=True) + # if x and n are split up without negating each term and n is negative + # then the answer might be wrong; if n is 0 it won't matter since + # 1/oo and 1/zoo are both zero as is sqrt(0)/sqrt(-x) unless x is also + # zero (in which case the negative sign doesn't matter): + # 1/sqrt(1/-1) = -I but sqrt(-1)/sqrt(1) = I + assert (1/sqrt(x/n)).as_numer_denom() == (sqrt(-n), sqrt(-x)) + c = Symbol('c', complex=True) + e = sqrt(1/c) + assert e.as_numer_denom() == (e, 1) + i = Symbol('i', integer=True) + assert ((1 + x/y)**i).as_numer_denom() == ((x + y)**i, y**i) + + +def test_Pow_Expr_args(): + bases = [Basic(), Poly(x, x), FiniteSet(x)] + for base in bases: + # The cache can mess with the stacklevel test + with warns(SymPyDeprecationWarning, test_stacklevel=False): + Pow(base, S.One) + + +def test_Pow_signs(): + """Cf. issues 4595 and 5250""" + n = Symbol('n', even=True) + assert (3 - y)**2 != (y - 3)**2 + assert (3 - y)**n != (y - 3)**n + assert (-3 + y - x)**2 != (3 - y + x)**2 + assert (y - 3)**3 != -(3 - y)**3 + + +def test_power_with_noncommutative_mul_as_base(): + x = Symbol('x', commutative=False) + y = Symbol('y', commutative=False) + assert not (x*y)**3 == x**3*y**3 + assert (2*x*y)**3 == 8*(x*y)**3 + + +@_both_exp_pow +def test_power_rewrite_exp(): + assert (I**I).rewrite(exp) == exp(-pi/2) + + expr = (2 + 3*I)**(4 + 5*I) + assert expr.rewrite(exp) == exp((4 + 5*I)*(log(sqrt(13)) + I*atan(Rational(3, 2)))) + assert expr.rewrite(exp).expand() == \ + 169*exp(5*I*log(13)/2)*exp(4*I*atan(Rational(3, 2)))*exp(-5*atan(Rational(3, 2))) + + assert ((6 + 7*I)**5).rewrite(exp) == 7225*sqrt(85)*exp(5*I*atan(Rational(7, 6))) + + expr = 5**(6 + 7*I) + assert expr.rewrite(exp) == exp((6 + 7*I)*log(5)) + assert expr.rewrite(exp).expand() == 15625*exp(7*I*log(5)) + + assert Pow(123, 789, evaluate=False).rewrite(exp) == 123**789 + assert (1**I).rewrite(exp) == 1**I + assert (0**I).rewrite(exp) == 0**I + + expr = (-2)**(2 + 5*I) + assert expr.rewrite(exp) == exp((2 + 5*I)*(log(2) + I*pi)) + assert expr.rewrite(exp).expand() == 4*exp(-5*pi)*exp(5*I*log(2)) + + assert ((-2)**S(-5)).rewrite(exp) == (-2)**S(-5) + + x, y = symbols('x y') + assert (x**y).rewrite(exp) == exp(y*log(x)) + if global_parameters.exp_is_pow: + assert (7**x).rewrite(exp) == Pow(S.Exp1, x*log(7), evaluate=False) + else: + assert (7**x).rewrite(exp) == exp(x*log(7), evaluate=False) + assert ((2 + 3*I)**x).rewrite(exp) == exp(x*(log(sqrt(13)) + I*atan(Rational(3, 2)))) + assert (y**(5 + 6*I)).rewrite(exp) == exp(log(y)*(5 + 6*I)) + + assert all((1/func(x)).rewrite(exp) == 1/(func(x).rewrite(exp)) for func in + (sin, cos, tan, sec, csc, sinh, cosh, tanh)) + + +def test_zero(): + assert 0**x != 0 + assert 0**(2*x) == 0**x + assert 0**(1.0*x) == 0**x + assert 0**(2.0*x) == 0**x + assert (0**(2 - x)).as_base_exp() == (0, 2 - x) + assert 0**(x - 2) != S.Infinity**(2 - x) + assert 0**(2*x*y) == 0**(x*y) + assert 0**(-2*x*y) == S.ComplexInfinity**(x*y) + assert Float(0)**2 is not S.Zero + assert Float(0)**2 == 0.0 + assert Float(0)**-2 is zoo + assert Float(0)**oo is S.Zero + + #Test issue 19572 + assert 0 ** -oo is zoo + assert power(0, -oo) is zoo + assert Float(0)**-oo is zoo + +def test_pow_as_base_exp(): + assert (S.Infinity**(2 - x)).as_base_exp() == (S.Infinity, 2 - x) + assert (S.Infinity**(x - 2)).as_base_exp() == (S.Infinity, x - 2) + p = S.Half**x + assert p.base, p.exp == p.as_base_exp() == (S(2), -x) + p = (S(3)/2)**x + assert p.base, p.exp == p.as_base_exp() == (3*S.Half, x) + p = (S(2)/3)**x + assert p.as_base_exp() == (S(2)/3, x) + assert p.base, p.exp == (S(2)/3, x) + # issue 8344: + assert Pow(1, 2, evaluate=False).as_base_exp() == (S.One, S(2)) + + +def test_nseries(): + assert sqrt(I*x - 1)._eval_nseries(x, 4, None, 1) == I + x/2 + I*x**2/8 - x**3/16 + O(x**4) + assert sqrt(I*x - 1)._eval_nseries(x, 4, None, -1) == -I - x/2 - I*x**2/8 + x**3/16 + O(x**4) + assert cbrt(I*x - 1)._eval_nseries(x, 4, None, 1) == (-1)**(S(1)/3) - (-1)**(S(5)/6)*x/3 + \ + (-1)**(S(1)/3)*x**2/9 + 5*(-1)**(S(5)/6)*x**3/81 + O(x**4) + assert cbrt(I*x - 1)._eval_nseries(x, 4, None, -1) == -(-1)**(S(2)/3) - (-1)**(S(1)/6)*x/3 - \ + (-1)**(S(2)/3)*x**2/9 + 5*(-1)**(S(1)/6)*x**3/81 + O(x**4) + assert (1 / (exp(-1/x) + 1/x))._eval_nseries(x, 2, None) == x + O(x**2) + # test issue 23752 + assert sqrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, 1) == -sqrt(3)*I + sqrt(3)*I*x/6 - \ + sqrt(3)*I*x**2*(-S(1)/72 + I/6) - sqrt(3)*I*x**3*(-S(1)/432 + I/36) + O(x**4) + assert sqrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, -1) == -sqrt(3)*I + sqrt(3)*I*x/6 - \ + sqrt(3)*I*x**2*(-S(1)/72 + I/6) - sqrt(3)*I*x**3*(-S(1)/432 + I/36) + O(x**4) + assert cbrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, 1) == -(-1)**(S(2)/3)*3**(S(1)/3) + \ + (-1)**(S(2)/3)*3**(S(1)/3)*x/9 - (-1)**(S(2)/3)*3**(S(1)/3)*x**2*(-S(1)/81 + I/9) - \ + (-1)**(S(2)/3)*3**(S(1)/3)*x**3*(-S(5)/2187 + 2*I/81) + O(x**4) + assert cbrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, -1) == -(-1)**(S(2)/3)*3**(S(1)/3) + \ + (-1)**(S(2)/3)*3**(S(1)/3)*x/9 - (-1)**(S(2)/3)*3**(S(1)/3)*x**2*(-S(1)/81 + I/9) - \ + (-1)**(S(2)/3)*3**(S(1)/3)*x**3*(-S(5)/2187 + 2*I/81) + O(x**4) + + +def test_issue_6100_12942_4473(): + assert x**1.0 != x + assert x != x**1.0 + assert True != x**1.0 + assert x**1.0 is not True + assert x is not True + assert x*y != (x*y)**1.0 + # Pow != Symbol + assert (x**1.0)**1.0 != x + assert (x**1.0)**2.0 != x**2 + b = Expr() + assert Pow(b, 1.0, evaluate=False) != b + # if the following gets distributed as a Mul (x**1.0*y**1.0 then + # __eq__ methods could be added to Symbol and Pow to detect the + # power-of-1.0 case. + assert ((x*y)**1.0).func is Pow + + +def test_issue_6208(): + from sympy.functions.elementary.miscellaneous import root + assert sqrt(33**(I*9/10)) == -33**(I*9/20) + assert root((6*I)**(2*I), 3).as_base_exp()[1] == Rational(1, 3) # != 2*I/3 + assert root((6*I)**(I/3), 3).as_base_exp()[1] == I/9 + assert sqrt(exp(3*I)) == exp(3*I/2) + assert sqrt(-sqrt(3)*(1 + 2*I)) == sqrt(sqrt(3))*sqrt(-1 - 2*I) + assert sqrt(exp(5*I)) == -exp(5*I/2) + assert root(exp(5*I), 3).exp == Rational(1, 3) + + +def test_issue_6990(): + assert (sqrt(a + b*x + x**2)).series(x, 0, 3).removeO() == \ + sqrt(a)*x**2*(1/(2*a) - b**2/(8*a**2)) + sqrt(a) + b*x/(2*sqrt(a)) + + +def test_issue_6068(): + assert sqrt(sin(x)).series(x, 0, 7) == \ + sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \ + x**Rational(13, 2)/24192 + O(x**7) + assert sqrt(sin(x)).series(x, 0, 9) == \ + sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \ + x**Rational(13, 2)/24192 - 67*x**Rational(17, 2)/29030400 + O(x**9) + assert sqrt(sin(x**3)).series(x, 0, 19) == \ + x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 + O(x**19) + assert sqrt(sin(x**3)).series(x, 0, 20) == \ + x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 - \ + x**Rational(39, 2)/24192 + O(x**20) + + +def test_issue_6782(): + assert sqrt(sin(x**3)).series(x, 0, 7) == x**Rational(3, 2) + O(x**7) + assert sqrt(sin(x**4)).series(x, 0, 3) == x**2 + O(x**3) + + +def test_issue_6653(): + assert (1 / sqrt(1 + sin(x**2))).series(x, 0, 3) == 1 - x**2/2 + O(x**3) + + +def test_issue_6429(): + f = (c**2 + x)**(0.5) + assert f.series(x, x0=0, n=1) == (c**2)**0.5 + O(x) + assert f.taylor_term(0, x) == (c**2)**0.5 + assert f.taylor_term(1, x) == 0.5*x*(c**2)**(-0.5) + assert f.taylor_term(2, x) == -0.125*x**2*(c**2)**(-1.5) + + +def test_issue_7638(): + f = pi/log(sqrt(2)) + assert ((1 + I)**(I*f/2))**0.3 == (1 + I)**(0.15*I*f) + # if 1/3 -> 1.0/3 this should fail since it cannot be shown that the + # sign will be +/-1; for the previous "small arg" case, it didn't matter + # that this could not be proved + assert (1 + I)**(4*I*f) == ((1 + I)**(12*I*f))**Rational(1, 3) + + assert (((1 + I)**(I*(1 + 7*f)))**Rational(1, 3)).exp == Rational(1, 3) + r = symbols('r', real=True) + assert sqrt(r**2) == abs(r) + assert cbrt(r**3) != r + assert sqrt(Pow(2*I, 5*S.Half)) != (2*I)**Rational(5, 4) + p = symbols('p', positive=True) + assert cbrt(p**2) == p**Rational(2, 3) + assert NS(((0.2 + 0.7*I)**(0.7 + 1.0*I))**(0.5 - 0.1*I), 1) == '0.4 + 0.2*I' + assert sqrt(1/(1 + I)) == sqrt(1 - I)/sqrt(2) # or 1/sqrt(1 + I) + e = 1/(1 - sqrt(2)) + assert sqrt(e) == I/sqrt(-1 + sqrt(2)) + assert e**Rational(-1, 2) == -I*sqrt(-1 + sqrt(2)) + assert sqrt((cos(1)**2 + sin(1)**2 - 1)**(3 + I)).exp in [S.Half, + Rational(3, 2) + I/2] + assert sqrt(r**Rational(4, 3)) != r**Rational(2, 3) + assert sqrt((p + I)**Rational(4, 3)) == (p + I)**Rational(2, 3) + + for q in 1+I, 1-I: + assert sqrt(q**2) == q + for q in -1+I, -1-I: + assert sqrt(q**2) == -q + + assert sqrt((p + r*I)**2) != p + r*I + e = (1 + I/5) + assert sqrt(e**5) == e**(5*S.Half) + assert sqrt(e**6) == e**3 + assert sqrt((1 + I*r)**6) != (1 + I*r)**3 + + +def test_issue_8582(): + assert 1**oo is nan + assert 1**(-oo) is nan + assert 1**zoo is nan + assert 1**(oo + I) is nan + assert 1**(1 + I*oo) is nan + assert 1**(oo + I*oo) is nan + + +def test_issue_8650(): + n = Symbol('n', integer=True, nonnegative=True) + assert (n**n).is_positive is True + x = 5*n + 5 + assert (x**(5*(n + 1))).is_positive is True + + +def test_issue_13914(): + b = Symbol('b') + assert (-1)**zoo is nan + assert 2**zoo is nan + assert (S.Half)**(1 + zoo) is nan + assert I**(zoo + I) is nan + assert b**(I + zoo) is nan + + +def test_better_sqrt(): + n = Symbol('n', integer=True, nonnegative=True) + assert sqrt(3 + 4*I) == 2 + I + assert sqrt(3 - 4*I) == 2 - I + assert sqrt(-3 - 4*I) == 1 - 2*I + assert sqrt(-3 + 4*I) == 1 + 2*I + assert sqrt(32 + 24*I) == 6 + 2*I + assert sqrt(32 - 24*I) == 6 - 2*I + assert sqrt(-32 - 24*I) == 2 - 6*I + assert sqrt(-32 + 24*I) == 2 + 6*I + + # triple (3, 4, 5): + # parity of 3 matches parity of 5 and + # den, 4, is a square + assert sqrt((3 + 4*I)/4) == 1 + I/2 + # triple (8, 15, 17) + # parity of 8 doesn't match parity of 17 but + # den/2, 8/2, is a square + assert sqrt((8 + 15*I)/8) == (5 + 3*I)/4 + # handle the denominator + assert sqrt((3 - 4*I)/25) == (2 - I)/5 + assert sqrt((3 - 4*I)/26) == (2 - I)/sqrt(26) + # mul + # issue #12739 + assert sqrt((3 + 4*I)/(3 - 4*I)) == (3 + 4*I)/5 + assert sqrt(2/(3 + 4*I)) == sqrt(2)/5*(2 - I) + assert sqrt(n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(2 - I) + assert sqrt(-2/(3 + 4*I)) == sqrt(2)/5*(1 + 2*I) + assert sqrt(-n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(1 + 2*I) + # power + assert sqrt(1/(3 + I*4)) == (2 - I)/5 + assert sqrt(1/(3 - I)) == sqrt(10)*sqrt(3 + I)/10 + # symbolic + i = symbols('i', imaginary=True) + assert sqrt(3/i) == Mul(sqrt(3), 1/sqrt(i), evaluate=False) + # multiples of 1/2; don't make this too automatic + assert sqrt(3 + 4*I)**3 == (2 + I)**3 + assert Pow(3 + 4*I, Rational(3, 2)) == 2 + 11*I + assert Pow(6 + 8*I, Rational(3, 2)) == 2*sqrt(2)*(2 + 11*I) + n, d = (3 + 4*I), (3 - 4*I)**3 + a = n/d + assert a.args == (1/d, n) + eq = sqrt(a) + assert eq.args == (a, S.Half) + assert expand_multinomial(eq) == sqrt((-117 + 44*I)*(3 + 4*I))/125 + assert eq.expand() == (7 - 24*I)/125 + + # issue 12775 + # pos im part + assert sqrt(2*I) == (1 + I) + assert sqrt(2*9*I) == Mul(3, 1 + I, evaluate=False) + assert Pow(2*I, 3*S.Half) == (1 + I)**3 + # neg im part + assert sqrt(-I/2) == Mul(S.Half, 1 - I, evaluate=False) + # fractional im part + assert Pow(Rational(-9, 2)*I, Rational(3, 2)) == 27*(1 - I)**3/8 + + +def test_issue_2993(): + assert str((2.3*x - 4)**0.3) == '(2.3*x - 4)**0.3' + assert str((2.3*x + 4)**0.3) == '(2.3*x + 4)**0.3' + assert str((-2.3*x + 4)**0.3) == '(4 - 2.3*x)**0.3' + assert str((-2.3*x - 4)**0.3) == '(-2.3*x - 4)**0.3' + assert str((2.3*x - 2)**0.3) == '(2.3*x - 2)**0.3' + assert str((-2.3*x - 2)**0.3) == '(-2.3*x - 2)**0.3' + assert str((-2.3*x + 2)**0.3) == '(2 - 2.3*x)**0.3' + assert str((2.3*x + 2)**0.3) == '(2.3*x + 2)**0.3' + assert str((2.3*x - 4)**Rational(1, 3)) == '(2.3*x - 4)**(1/3)' + eq = (2.3*x + 4) + assert str(eq**2) == '(2.3*x + 4)**2' + assert (1/eq).args == (eq, -1) # don't change trivial power + # issue 17735 + q=.5*exp(x) - .5*exp(-x) + 0.1 + assert int((q**2).subs(x, 1)) == 1 + # issue 17756 + y = Symbol('y') + assert len(sqrt(x/(x + y)**2 + Float('0.008', 30)).subs(y, pi.n(25)).atoms(Float)) == 2 + # issue 17756 + a, b, c, d, e, f, g = symbols('a:g') + expr = sqrt(1 + a*(c**4 + g*d - 2*g*e - f*(-g + d))**2/ + (c**3*b**2*(d - 3*e + 2*f)**2))/2 + r = [ + (a, N('0.0170992456333788667034850458615', 30)), + (b, N('0.0966594956075474769169134801223', 30)), + (c, N('0.390911862903463913632151616184', 30)), + (d, N('0.152812084558656566271750185933', 30)), + (e, N('0.137562344465103337106561623432', 30)), + (f, N('0.174259178881496659302933610355', 30)), + (g, N('0.220745448491223779615401870086', 30))] + tru = expr.n(30, subs=dict(r)) + seq = expr.subs(r) + # although `tru` is the right way to evaluate + # expr with numerical values, `seq` will have + # significant loss of precision if extraction of + # the largest coefficient of a power's base's terms + # is done improperly + assert seq == tru + +def test_issue_17450(): + assert (erf(cosh(1)**7)**I).is_real is None + assert (erf(cosh(1)**7)**I).is_imaginary is False + assert (Pow(exp(1+sqrt(2)), ((1-sqrt(2))*I*pi), evaluate=False)).is_real is None + assert ((-10)**(10*I*pi/3)).is_real is False + assert ((-5)**(4*I*pi)).is_real is False + + +def test_issue_18190(): + assert sqrt(1 / tan(1 + I)) == 1 / sqrt(tan(1 + I)) + + +def test_issue_14815(): + x = Symbol('x', real=True) + assert sqrt(x).is_extended_negative is False + x = Symbol('x', real=False) + assert sqrt(x).is_extended_negative is None + x = Symbol('x', complex=True) + assert sqrt(x).is_extended_negative is False + x = Symbol('x', extended_real=True) + assert sqrt(x).is_extended_negative is False + assert sqrt(zoo, evaluate=False).is_extended_negative is False + assert sqrt(nan, evaluate=False).is_extended_negative is None + + +def test_issue_18509(): + x = Symbol('x', prime=True) + assert x**oo is oo + assert (1/x)**oo is S.Zero + assert (-1/x)**oo is S.Zero + assert (-x)**oo is zoo + assert (-oo)**(-1 + I) is S.Zero + assert (-oo)**(1 + I) is zoo + assert (oo)**(-1 + I) is S.Zero + assert (oo)**(1 + I) is zoo + + +def test_issue_18762(): + e, p = symbols('e p') + g0 = sqrt(1 + e**2 - 2*e*cos(p)) + assert len(g0.series(e, 1, 3).args) == 4 + + +def test_issue_21860(): + e = 3*2**Rational(66666666667,200000000000)*3**Rational(16666666667,50000000000)*x**Rational(66666666667, 200000000000) + ans = Mul(Rational(3, 2), + Pow(Integer(2), Rational(33333333333, 100000000000)), + Pow(Integer(3), Rational(26666666667, 40000000000))) + assert e.xreplace({x: Rational(3,8)}) == ans + + +def test_issue_21647(): + e = log((Integer(567)/500)**(811*(Integer(567)/500)**x/100)) + ans = log(Mul(Rational(64701150190720499096094005280169087619821081527, + 76293945312500000000000000000000000000000000000), + Pow(Integer(2), Rational(396204892125479941, 781250000000000000)), + Pow(Integer(3), Rational(385045107874520059, 390625000000000000)), + Pow(Integer(5), Rational(407364676376439823, 1562500000000000000)), + Pow(Integer(7), Rational(385045107874520059, 1562500000000000000)))) + assert e.xreplace({x: 6}) == ans + + +def test_issue_21762(): + e = (x**2 + 6)**(Integer(33333333333333333)/50000000000000000) + ans = Mul(Rational(5, 4), + Pow(Integer(2), Rational(16666666666666667, 25000000000000000)), + Pow(Integer(5), Rational(8333333333333333, 25000000000000000))) + assert e.xreplace({x: S.Half}) == ans + + +def test_issue_14704(): + a = 144**144 + x, xexact = integer_nthroot(a,a) + assert x == 1 and xexact is False + + +def test_rational_powers_larger_than_one(): + assert Rational(2, 3)**Rational(3, 2) == 2*sqrt(6)/9 + assert Rational(1, 6)**Rational(9, 4) == 6**Rational(3, 4)/216 + assert Rational(3, 7)**Rational(7, 3) == 9*3**Rational(1, 3)*7**Rational(2, 3)/343 + + +def test_power_dispatcher(): + + class NewBase(Expr): + pass + class NewPow(NewBase, Pow): + pass + a, b = Symbol('a'), NewBase() + + @power.register(Expr, NewBase) + @power.register(NewBase, Expr) + @power.register(NewBase, NewBase) + def _(a, b): + return NewPow(a, b) + + # Pow called as fallback + assert power(2, 3) == 8*S.One + assert power(a, 2) == Pow(a, 2) + assert power(a, a) == Pow(a, a) + + # NewPow called by dispatch + assert power(a, b) == NewPow(a, b) + assert power(b, a) == NewPow(b, a) + assert power(b, b) == NewPow(b, b) + + +def test_powers_of_I(): + assert [sqrt(I)**i for i in range(13)] == [ + 1, sqrt(I), I, sqrt(I)**3, -1, -sqrt(I), -I, -sqrt(I)**3, + 1, sqrt(I), I, sqrt(I)**3, -1] + assert sqrt(I)**(S(9)/2) == -I**(S(1)/4) + + +def test_issue_23918(): + b = S(2)/3 + assert (b**x).as_base_exp() == (b, x) + + +def test_issue_26546(): + x = Symbol('x', real=True) + assert x.is_extended_real is True + assert sqrt(x+I).is_extended_real is False + assert Pow(x+I, S.Half).is_extended_real is False + assert Pow(x+I, Rational(1,2)).is_extended_real is False + assert Pow(x+I, Rational(1,13)).is_extended_real is False + assert Pow(x+I, Rational(2,3)).is_extended_real is None + + +def test_issue_25165(): + e1 = (1/sqrt(( - x + 1)**2 + (x - 0.23)**4)).series(x, 0, 2) + e2 = 0.998603724830355 + 1.02004923189934*x + O(x**2) + assert all_close(e1, e2) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_priority.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_priority.py new file mode 100644 index 0000000000000000000000000000000000000000..276e653100f886243e07b866b699b8da53cdaf88 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_priority.py @@ -0,0 +1,145 @@ +from sympy.core.decorators import call_highest_priority +from sympy.core.expr import Expr +from sympy.core.mod import Mod +from sympy.core.numbers import Integer +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.integers import floor + + +class Higher(Integer): + ''' + Integer of value 1 and _op_priority 20 + + Operations handled by this class return 1 and reverse operations return 2 + ''' + + _op_priority = 20.0 + result: Expr = S.One + + def __new__(cls): + obj = Expr.__new__(cls) + obj.p = 1 + return obj + + @call_highest_priority('__rmul__') + def __mul__(self, other): + return self.result + + @call_highest_priority('__mul__') + def __rmul__(self, other): + return 2*self.result + + @call_highest_priority('__radd__') + def __add__(self, other): + return self.result + + @call_highest_priority('__add__') + def __radd__(self, other): + return 2*self.result + + @call_highest_priority('__rsub__') + def __sub__(self, other): + return self.result + + @call_highest_priority('__sub__') + def __rsub__(self, other): + return 2*self.result + + @call_highest_priority('__rpow__') + def __pow__(self, other): + return self.result + + @call_highest_priority('__pow__') + def __rpow__(self, other): + return 2*self.result + + @call_highest_priority('__rtruediv__') + def __truediv__(self, other): + return self.result + + @call_highest_priority('__truediv__') + def __rtruediv__(self, other): + return 2*self.result + + @call_highest_priority('__rmod__') + def __mod__(self, other): + return self.result + + @call_highest_priority('__mod__') + def __rmod__(self, other): + return 2*self.result + + @call_highest_priority('__rfloordiv__') + def __floordiv__(self, other): + return self.result + + @call_highest_priority('__floordiv__') + def __rfloordiv__(self, other): + return 2*self.result + + +class Lower(Higher): + ''' + Integer of value -1 and _op_priority 5 + + Operations handled by this class return -1 and reverse operations return -2 + ''' + + _op_priority = 5.0 + result: Expr = S.NegativeOne + + def __new__(cls): + obj = Expr.__new__(cls) + obj.p = -1 + return obj + + +x = Symbol('x') +h = Higher() +l = Lower() + + +def test_mul(): + assert h*l == h*x == 1 + assert l*h == x*h == 2 + assert x*l == l*x == -x + + +def test_add(): + assert h + l == h + x == 1 + assert l + h == x + h == 2 + assert x + l == l + x == x - 1 + + +def test_sub(): + assert h - l == h - x == 1 + assert l - h == x - h == 2 + assert x - l == -(l - x) == x + 1 + + +def test_pow(): + assert h**l == h**x == 1 + assert l**h == x**h == 2 + assert (x**l).args == (1/x).args and (x**l).is_Pow + assert (l**x).args == ((-1)**x).args and (l**x).is_Pow + + +def test_div(): + assert h/l == h/x == 1 + assert l/h == x/h == 2 + assert x/l == 1/(l/x) == -x + + +def test_mod(): + assert h%l == h%x == 1 + assert l%h == x%h == 2 + assert x%l == Mod(x, -1) + assert l%x == Mod(-1, x) + + +def test_floordiv(): + assert h//l == h//x == 1 + assert l//h == x//h == 2 + assert x//l == floor(-x) + assert l//x == floor(-1/x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_random.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_random.py new file mode 100644 index 0000000000000000000000000000000000000000..01c677126285eb66349253368b94b3270fb97793 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_random.py @@ -0,0 +1,61 @@ +import random +from sympy.core.random import random as rand, seed, shuffle, _assumptions_shuffle +from sympy.core.symbol import Symbol, symbols +from sympy.functions.elementary.trigonometric import sin, acos +from sympy.abc import x + + +def test_random(): + random.seed(42) + a = random.random() + random.seed(42) + Symbol('z').is_finite + b = random.random() + assert a == b + + got = set() + for i in range(2): + random.seed(28) + m0, m1 = symbols('m_0 m_1', real=True) + _ = acos(-m0/m1) + got.add(random.uniform(0,1)) + assert len(got) == 1 + + random.seed(10) + y = 0 + for i in range(4): + y += sin(random.uniform(-10,10) * x) + random.seed(10) + z = 0 + for i in range(4): + z += sin(random.uniform(-10,10) * x) + assert y == z + + +def test_seed(): + assert rand() < 1 + seed(1) + a = rand() + b = rand() + seed(1) + c = rand() + d = rand() + assert a == c + if not c == d: + assert a != b + else: + assert a == b + + abc = 'abc' + first = list(abc) + second = list(abc) + third = list(abc) + + seed(123) + shuffle(first) + + seed(123) + shuffle(second) + _assumptions_shuffle(third) + + assert first == second == third diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_relational.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_relational.py new file mode 100644 index 0000000000000000000000000000000000000000..60c026fd5f5b8cee2e90e00582047cc7763bb8a4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_relational.py @@ -0,0 +1,1271 @@ +from sympy.core.logic import fuzzy_and +from sympy.core.sympify import _sympify +from sympy.multipledispatch import dispatch +from sympy.testing.pytest import XFAIL, raises +from sympy.assumptions.ask import Q +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.expr import Expr, unchanged +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import sign, Abs +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.logic.boolalg import (And, Implies, Not, Or, Xor) +from sympy.sets import Reals +from sympy.simplify.simplify import simplify +from sympy.simplify.trigsimp import trigsimp +from sympy.core.relational import (Relational, Equality, Unequality, + GreaterThan, LessThan, StrictGreaterThan, + StrictLessThan, Rel, Eq, Lt, Le, + Gt, Ge, Ne, is_le, is_gt, is_ge, is_lt, is_eq, is_neq) +from sympy.sets.sets import Interval, FiniteSet + +from itertools import combinations + +x, y, z, t = symbols('x,y,z,t') + + +def rel_check(a, b): + from sympy.testing.pytest import raises + assert a.is_number and b.is_number + for do in range(len({type(a), type(b)})): + if S.NaN in (a, b): + v = [(a == b), (a != b)] + assert len(set(v)) == 1 and v[0] == False + assert not (a != b) and not (a == b) + assert raises(TypeError, lambda: a < b) + assert raises(TypeError, lambda: a <= b) + assert raises(TypeError, lambda: a > b) + assert raises(TypeError, lambda: a >= b) + else: + E = [(a == b), (a != b)] + assert len(set(E)) == 2 + v = [ + (a < b), (a <= b), (a > b), (a >= b)] + i = [ + [True, True, False, False], + [False, True, False, True], # <-- i == 1 + [False, False, True, True]].index(v) + if i == 1: + assert E[0] or (a.is_Float != b.is_Float) # ugh + else: + assert E[1] + a, b = b, a + return True + + +def test_rel_ne(): + assert Relational(x, y, '!=') == Ne(x, y) + + # issue 6116 + p = Symbol('p', positive=True) + assert Ne(p, 0) is S.true + + +def test_rel_subs(): + e = Relational(x, y, '==') + e = e.subs(x, z) + + assert isinstance(e, Equality) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '>=') + e = e.subs(x, z) + + assert isinstance(e, GreaterThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '<=') + e = e.subs(x, z) + + assert isinstance(e, LessThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '>') + e = e.subs(x, z) + + assert isinstance(e, StrictGreaterThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '<') + e = e.subs(x, z) + + assert isinstance(e, StrictLessThan) + assert e.lhs == z + assert e.rhs == y + + e = Eq(x, 0) + assert e.subs(x, 0) is S.true + assert e.subs(x, 1) is S.false + + +def test_wrappers(): + e = x + x**2 + + res = Relational(y, e, '==') + assert Rel(y, x + x**2, '==') == res + assert Eq(y, x + x**2) == res + + res = Relational(y, e, '<') + assert Lt(y, x + x**2) == res + + res = Relational(y, e, '<=') + assert Le(y, x + x**2) == res + + res = Relational(y, e, '>') + assert Gt(y, x + x**2) == res + + res = Relational(y, e, '>=') + assert Ge(y, x + x**2) == res + + res = Relational(y, e, '!=') + assert Ne(y, x + x**2) == res + + +def test_Eq_Ne(): + + assert Eq(x, x) # issue 5719 + + # issue 6116 + p = Symbol('p', positive=True) + assert Eq(p, 0) is S.false + + # issue 13348; 19048 + # SymPy is strict about 0 and 1 not being + # interpreted as Booleans + assert Eq(True, 1) is S.false + assert Eq(False, 0) is S.false + assert Eq(~x, 0) is S.false + assert Eq(~x, 1) is S.false + assert Ne(True, 1) is S.true + assert Ne(False, 0) is S.true + assert Ne(~x, 0) is S.true + assert Ne(~x, 1) is S.true + + assert Eq((), 1) is S.false + assert Ne((), 1) is S.true + + +def test_as_poly(): + from sympy.polys.polytools import Poly + # Only Eq should have an as_poly method: + assert Eq(x, 1).as_poly() == Poly(x - 1, x, domain='ZZ') + raises(AttributeError, lambda: Ne(x, 1).as_poly()) + raises(AttributeError, lambda: Ge(x, 1).as_poly()) + raises(AttributeError, lambda: Gt(x, 1).as_poly()) + raises(AttributeError, lambda: Le(x, 1).as_poly()) + raises(AttributeError, lambda: Lt(x, 1).as_poly()) + + +def test_rel_Infinity(): + # NOTE: All of these are actually handled by sympy.core.Number, and do + # not create Relational objects. + assert (oo > oo) is S.false + assert (oo > -oo) is S.true + assert (oo > 1) is S.true + assert (oo < oo) is S.false + assert (oo < -oo) is S.false + assert (oo < 1) is S.false + assert (oo >= oo) is S.true + assert (oo >= -oo) is S.true + assert (oo >= 1) is S.true + assert (oo <= oo) is S.true + assert (oo <= -oo) is S.false + assert (oo <= 1) is S.false + assert (-oo > oo) is S.false + assert (-oo > -oo) is S.false + assert (-oo > 1) is S.false + assert (-oo < oo) is S.true + assert (-oo < -oo) is S.false + assert (-oo < 1) is S.true + assert (-oo >= oo) is S.false + assert (-oo >= -oo) is S.true + assert (-oo >= 1) is S.false + assert (-oo <= oo) is S.true + assert (-oo <= -oo) is S.true + assert (-oo <= 1) is S.true + + +def test_infinite_symbol_inequalities(): + x = Symbol('x', extended_positive=True, infinite=True) + y = Symbol('y', extended_positive=True, infinite=True) + z = Symbol('z', extended_negative=True, infinite=True) + w = Symbol('w', extended_negative=True, infinite=True) + + inf_set = (x, y, oo) + ninf_set = (z, w, -oo) + + for inf1 in inf_set: + assert (inf1 < 1) is S.false + assert (inf1 > 1) is S.true + assert (inf1 <= 1) is S.false + assert (inf1 >= 1) is S.true + + for inf2 in inf_set: + assert (inf1 < inf2) is S.false + assert (inf1 > inf2) is S.false + assert (inf1 <= inf2) is S.true + assert (inf1 >= inf2) is S.true + + for ninf1 in ninf_set: + assert (inf1 < ninf1) is S.false + assert (inf1 > ninf1) is S.true + assert (inf1 <= ninf1) is S.false + assert (inf1 >= ninf1) is S.true + assert (ninf1 < inf1) is S.true + assert (ninf1 > inf1) is S.false + assert (ninf1 <= inf1) is S.true + assert (ninf1 >= inf1) is S.false + + for ninf1 in ninf_set: + assert (ninf1 < 1) is S.true + assert (ninf1 > 1) is S.false + assert (ninf1 <= 1) is S.true + assert (ninf1 >= 1) is S.false + + for ninf2 in ninf_set: + assert (ninf1 < ninf2) is S.false + assert (ninf1 > ninf2) is S.false + assert (ninf1 <= ninf2) is S.true + assert (ninf1 >= ninf2) is S.true + + +def test_bool(): + assert Eq(0, 0) is S.true + assert Eq(1, 0) is S.false + assert Ne(0, 0) is S.false + assert Ne(1, 0) is S.true + assert Lt(0, 1) is S.true + assert Lt(1, 0) is S.false + assert Le(0, 1) is S.true + assert Le(1, 0) is S.false + assert Le(0, 0) is S.true + assert Gt(1, 0) is S.true + assert Gt(0, 1) is S.false + assert Ge(1, 0) is S.true + assert Ge(0, 1) is S.false + assert Ge(1, 1) is S.true + assert Eq(I, 2) is S.false + assert Ne(I, 2) is S.true + raises(TypeError, lambda: Gt(I, 2)) + raises(TypeError, lambda: Ge(I, 2)) + raises(TypeError, lambda: Lt(I, 2)) + raises(TypeError, lambda: Le(I, 2)) + a = Float('.000000000000000000001', '') + b = Float('.0000000000000000000001', '') + assert Eq(pi + a, pi + b) is S.false + + +def test_rich_cmp(): + assert (x < y) == Lt(x, y) + assert (x <= y) == Le(x, y) + assert (x > y) == Gt(x, y) + assert (x >= y) == Ge(x, y) + + +def test_doit(): + from sympy.core.symbol import Symbol + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + np = Symbol('np', nonpositive=True) + nn = Symbol('nn', nonnegative=True) + + assert Gt(p, 0).doit() is S.true + assert Gt(p, 1).doit() == Gt(p, 1) + assert Ge(p, 0).doit() is S.true + assert Le(p, 0).doit() is S.false + assert Lt(n, 0).doit() is S.true + assert Le(np, 0).doit() is S.true + assert Gt(nn, 0).doit() == Gt(nn, 0) + assert Lt(nn, 0).doit() is S.false + + assert Eq(x, 0).doit() == Eq(x, 0) + + +def test_new_relational(): + x = Symbol('x') + + assert Eq(x, 0) == Relational(x, 0) # None ==> Equality + assert Eq(x, 0) == Relational(x, 0, '==') + assert Eq(x, 0) == Relational(x, 0, 'eq') + assert Eq(x, 0) == Equality(x, 0) + + assert Eq(x, 0) != Relational(x, 1) # None ==> Equality + assert Eq(x, 0) != Relational(x, 1, '==') + assert Eq(x, 0) != Relational(x, 1, 'eq') + assert Eq(x, 0) != Equality(x, 1) + + assert Eq(x, -1) == Relational(x, -1) # None ==> Equality + assert Eq(x, -1) == Relational(x, -1, '==') + assert Eq(x, -1) == Relational(x, -1, 'eq') + assert Eq(x, -1) == Equality(x, -1) + assert Eq(x, -1) != Relational(x, 1) # None ==> Equality + assert Eq(x, -1) != Relational(x, 1, '==') + assert Eq(x, -1) != Relational(x, 1, 'eq') + assert Eq(x, -1) != Equality(x, 1) + + assert Ne(x, 0) == Relational(x, 0, '!=') + assert Ne(x, 0) == Relational(x, 0, '<>') + assert Ne(x, 0) == Relational(x, 0, 'ne') + assert Ne(x, 0) == Unequality(x, 0) + assert Ne(x, 0) != Relational(x, 1, '!=') + assert Ne(x, 0) != Relational(x, 1, '<>') + assert Ne(x, 0) != Relational(x, 1, 'ne') + assert Ne(x, 0) != Unequality(x, 1) + + assert Ge(x, 0) == Relational(x, 0, '>=') + assert Ge(x, 0) == Relational(x, 0, 'ge') + assert Ge(x, 0) == GreaterThan(x, 0) + assert Ge(x, 1) != Relational(x, 0, '>=') + assert Ge(x, 1) != Relational(x, 0, 'ge') + assert Ge(x, 1) != GreaterThan(x, 0) + assert (x >= 1) == Relational(x, 1, '>=') + assert (x >= 1) == Relational(x, 1, 'ge') + assert (x >= 1) == GreaterThan(x, 1) + assert (x >= 0) != Relational(x, 1, '>=') + assert (x >= 0) != Relational(x, 1, 'ge') + assert (x >= 0) != GreaterThan(x, 1) + + assert Le(x, 0) == Relational(x, 0, '<=') + assert Le(x, 0) == Relational(x, 0, 'le') + assert Le(x, 0) == LessThan(x, 0) + assert Le(x, 1) != Relational(x, 0, '<=') + assert Le(x, 1) != Relational(x, 0, 'le') + assert Le(x, 1) != LessThan(x, 0) + assert (x <= 1) == Relational(x, 1, '<=') + assert (x <= 1) == Relational(x, 1, 'le') + assert (x <= 1) == LessThan(x, 1) + assert (x <= 0) != Relational(x, 1, '<=') + assert (x <= 0) != Relational(x, 1, 'le') + assert (x <= 0) != LessThan(x, 1) + + assert Gt(x, 0) == Relational(x, 0, '>') + assert Gt(x, 0) == Relational(x, 0, 'gt') + assert Gt(x, 0) == StrictGreaterThan(x, 0) + assert Gt(x, 1) != Relational(x, 0, '>') + assert Gt(x, 1) != Relational(x, 0, 'gt') + assert Gt(x, 1) != StrictGreaterThan(x, 0) + assert (x > 1) == Relational(x, 1, '>') + assert (x > 1) == Relational(x, 1, 'gt') + assert (x > 1) == StrictGreaterThan(x, 1) + assert (x > 0) != Relational(x, 1, '>') + assert (x > 0) != Relational(x, 1, 'gt') + assert (x > 0) != StrictGreaterThan(x, 1) + + assert Lt(x, 0) == Relational(x, 0, '<') + assert Lt(x, 0) == Relational(x, 0, 'lt') + assert Lt(x, 0) == StrictLessThan(x, 0) + assert Lt(x, 1) != Relational(x, 0, '<') + assert Lt(x, 1) != Relational(x, 0, 'lt') + assert Lt(x, 1) != StrictLessThan(x, 0) + assert (x < 1) == Relational(x, 1, '<') + assert (x < 1) == Relational(x, 1, 'lt') + assert (x < 1) == StrictLessThan(x, 1) + assert (x < 0) != Relational(x, 1, '<') + assert (x < 0) != Relational(x, 1, 'lt') + assert (x < 0) != StrictLessThan(x, 1) + + # finally, some fuzz testing + from sympy.core.random import randint + for i in range(100): + while 1: + strtype, length = (chr, 65535) if randint(0, 1) else (chr, 255) + relation_type = strtype(randint(0, length)) + if randint(0, 1): + relation_type += strtype(randint(0, length)) + if relation_type not in ('==', 'eq', '!=', '<>', 'ne', '>=', 'ge', + '<=', 'le', '>', 'gt', '<', 'lt', ':=', + '+=', '-=', '*=', '/=', '%='): + break + + raises(ValueError, lambda: Relational(x, 1, relation_type)) + assert all(Relational(x, 0, op).rel_op == '==' for op in ('eq', '==')) + assert all(Relational(x, 0, op).rel_op == '!=' + for op in ('ne', '<>', '!=')) + assert all(Relational(x, 0, op).rel_op == '>' for op in ('gt', '>')) + assert all(Relational(x, 0, op).rel_op == '<' for op in ('lt', '<')) + assert all(Relational(x, 0, op).rel_op == '>=' for op in ('ge', '>=')) + assert all(Relational(x, 0, op).rel_op == '<=' for op in ('le', '<=')) + + +def test_relational_arithmetic(): + for cls in [Eq, Ne, Le, Lt, Ge, Gt]: + rel = cls(x, y) + raises(TypeError, lambda: 0+rel) + raises(TypeError, lambda: 1*rel) + raises(TypeError, lambda: 1**rel) + raises(TypeError, lambda: rel**1) + raises(TypeError, lambda: Add(0, rel)) + raises(TypeError, lambda: Mul(1, rel)) + raises(TypeError, lambda: Pow(1, rel)) + raises(TypeError, lambda: Pow(rel, 1)) + + +def test_relational_bool_output(): + # https://github.com/sympy/sympy/issues/5931 + raises(TypeError, lambda: bool(x > 3)) + raises(TypeError, lambda: bool(x >= 3)) + raises(TypeError, lambda: bool(x < 3)) + raises(TypeError, lambda: bool(x <= 3)) + raises(TypeError, lambda: bool(Eq(x, 3))) + raises(TypeError, lambda: bool(Ne(x, 3))) + + +def test_relational_logic_symbols(): + # See issue 6204 + assert (x < y) & (z < t) == And(x < y, z < t) + assert (x < y) | (z < t) == Or(x < y, z < t) + assert ~(x < y) == Not(x < y) + assert (x < y) >> (z < t) == Implies(x < y, z < t) + assert (x < y) << (z < t) == Implies(z < t, x < y) + assert (x < y) ^ (z < t) == Xor(x < y, z < t) + + assert isinstance((x < y) & (z < t), And) + assert isinstance((x < y) | (z < t), Or) + assert isinstance(~(x < y), GreaterThan) + assert isinstance((x < y) >> (z < t), Implies) + assert isinstance((x < y) << (z < t), Implies) + assert isinstance((x < y) ^ (z < t), (Or, Xor)) + + +def test_univariate_relational_as_set(): + assert (x > 0).as_set() == Interval(0, oo, True, True) + assert (x >= 0).as_set() == Interval(0, oo) + assert (x < 0).as_set() == Interval(-oo, 0, True, True) + assert (x <= 0).as_set() == Interval(-oo, 0) + assert Eq(x, 0).as_set() == FiniteSet(0) + assert Ne(x, 0).as_set() == Interval(-oo, 0, True, True) + \ + Interval(0, oo, True, True) + + assert (x**2 >= 4).as_set() == Interval(-oo, -2) + Interval(2, oo) + + +@XFAIL +def test_multivariate_relational_as_set(): + assert (x*y >= 0).as_set() == Interval(0, oo)*Interval(0, oo) + \ + Interval(-oo, 0)*Interval(-oo, 0) + + +def test_Not(): + assert Not(Equality(x, y)) == Unequality(x, y) + assert Not(Unequality(x, y)) == Equality(x, y) + assert Not(StrictGreaterThan(x, y)) == LessThan(x, y) + assert Not(StrictLessThan(x, y)) == GreaterThan(x, y) + assert Not(GreaterThan(x, y)) == StrictLessThan(x, y) + assert Not(LessThan(x, y)) == StrictGreaterThan(x, y) + + +def test_evaluate(): + assert str(Eq(x, x, evaluate=False)) == 'Eq(x, x)' + assert Eq(x, x, evaluate=False).doit() == S.true + assert str(Ne(x, x, evaluate=False)) == 'Ne(x, x)' + assert Ne(x, x, evaluate=False).doit() == S.false + + assert str(Ge(x, x, evaluate=False)) == 'x >= x' + assert str(Le(x, x, evaluate=False)) == 'x <= x' + assert str(Gt(x, x, evaluate=False)) == 'x > x' + assert str(Lt(x, x, evaluate=False)) == 'x < x' + + +def assert_all_ineq_raise_TypeError(a, b): + raises(TypeError, lambda: a > b) + raises(TypeError, lambda: a >= b) + raises(TypeError, lambda: a < b) + raises(TypeError, lambda: a <= b) + raises(TypeError, lambda: b > a) + raises(TypeError, lambda: b >= a) + raises(TypeError, lambda: b < a) + raises(TypeError, lambda: b <= a) + + +def assert_all_ineq_give_class_Inequality(a, b): + """All inequality operations on `a` and `b` result in class Inequality.""" + from sympy.core.relational import _Inequality as Inequality + assert isinstance(a > b, Inequality) + assert isinstance(a >= b, Inequality) + assert isinstance(a < b, Inequality) + assert isinstance(a <= b, Inequality) + assert isinstance(b > a, Inequality) + assert isinstance(b >= a, Inequality) + assert isinstance(b < a, Inequality) + assert isinstance(b <= a, Inequality) + + +def test_imaginary_compare_raises_TypeError(): + # See issue #5724 + assert_all_ineq_raise_TypeError(I, x) + + +def test_complex_compare_not_real(): + # two cases which are not real + y = Symbol('y', imaginary=True) + z = Symbol('z', complex=True, extended_real=False) + for w in (y, z): + assert_all_ineq_raise_TypeError(2, w) + # some cases which should remain un-evaluated + t = Symbol('t') + x = Symbol('x', real=True) + z = Symbol('z', complex=True) + for w in (x, z, t): + assert_all_ineq_give_class_Inequality(2, w) + + +def test_imaginary_and_inf_compare_raises_TypeError(): + # See pull request #7835 + y = Symbol('y', imaginary=True) + assert_all_ineq_raise_TypeError(oo, y) + assert_all_ineq_raise_TypeError(-oo, y) + + +def test_complex_pure_imag_not_ordered(): + raises(TypeError, lambda: 2*I < 3*I) + + # more generally + x = Symbol('x', real=True, nonzero=True) + y = Symbol('y', imaginary=True) + z = Symbol('z', complex=True) + assert_all_ineq_raise_TypeError(I, y) + + t = I*x # an imaginary number, should raise errors + assert_all_ineq_raise_TypeError(2, t) + + t = -I*y # a real number, so no errors + assert_all_ineq_give_class_Inequality(2, t) + + t = I*z # unknown, should be unevaluated + assert_all_ineq_give_class_Inequality(2, t) + + +def test_x_minus_y_not_same_as_x_lt_y(): + """ + A consequence of pull request #7792 is that `x - y < 0` and `x < y` + are not synonymous. + """ + x = I + 2 + y = I + 3 + raises(TypeError, lambda: x < y) + assert x - y < 0 + + ineq = Lt(x, y, evaluate=False) + raises(TypeError, lambda: ineq.doit()) + assert ineq.lhs - ineq.rhs < 0 + + t = Symbol('t', imaginary=True) + x = 2 + t + y = 3 + t + ineq = Lt(x, y, evaluate=False) + raises(TypeError, lambda: ineq.doit()) + assert ineq.lhs - ineq.rhs < 0 + + # this one should give error either way + x = I + 2 + y = 2*I + 3 + raises(TypeError, lambda: x < y) + raises(TypeError, lambda: x - y < 0) + + +def test_nan_equality_exceptions(): + # See issue #7774 + import random + assert Equality(nan, nan) is S.false + assert Unequality(nan, nan) is S.true + + # See issue #7773 + A = (x, S.Zero, S.One/3, pi, oo, -oo) + assert Equality(nan, random.choice(A)) is S.false + assert Equality(random.choice(A), nan) is S.false + assert Unequality(nan, random.choice(A)) is S.true + assert Unequality(random.choice(A), nan) is S.true + + +def test_nan_inequality_raise_errors(): + # See discussion in pull request #7776. We test inequalities with + # a set including examples of various classes. + for q in (x, S.Zero, S(10), S.One/3, pi, S(1.3), oo, -oo, nan): + assert_all_ineq_raise_TypeError(q, nan) + + +def test_nan_complex_inequalities(): + # Comparisons of NaN with non-real raise errors, we're not too + # fussy whether its the NaN error or complex error. + for r in (I, zoo, Symbol('z', imaginary=True)): + assert_all_ineq_raise_TypeError(r, nan) + + +def test_complex_infinity_inequalities(): + raises(TypeError, lambda: zoo > 0) + raises(TypeError, lambda: zoo >= 0) + raises(TypeError, lambda: zoo < 0) + raises(TypeError, lambda: zoo <= 0) + + +def test_inequalities_symbol_name_same(): + """Using the operator and functional forms should give same results.""" + # We test all combinations from a set + # FIXME: could replace with random selection after test passes + A = (x, y, S.Zero, S.One/3, pi, oo, -oo) + for a in A: + for b in A: + assert Gt(a, b) == (a > b) + assert Lt(a, b) == (a < b) + assert Ge(a, b) == (a >= b) + assert Le(a, b) == (a <= b) + + for b in (y, S.Zero, S.One/3, pi, oo, -oo): + assert Gt(x, b, evaluate=False) == (x > b) + assert Lt(x, b, evaluate=False) == (x < b) + assert Ge(x, b, evaluate=False) == (x >= b) + assert Le(x, b, evaluate=False) == (x <= b) + + for b in (y, S.Zero, S.One/3, pi, oo, -oo): + assert Gt(b, x, evaluate=False) == (b > x) + assert Lt(b, x, evaluate=False) == (b < x) + assert Ge(b, x, evaluate=False) == (b >= x) + assert Le(b, x, evaluate=False) == (b <= x) + + +def test_inequalities_symbol_name_same_complex(): + """Using the operator and functional forms should give same results. + With complex non-real numbers, both should raise errors. + """ + # FIXME: could replace with random selection after test passes + for a in (x, S.Zero, S.One/3, pi, oo, Rational(1, 3)): + raises(TypeError, lambda: Gt(a, I)) + raises(TypeError, lambda: a > I) + raises(TypeError, lambda: Lt(a, I)) + raises(TypeError, lambda: a < I) + raises(TypeError, lambda: Ge(a, I)) + raises(TypeError, lambda: a >= I) + raises(TypeError, lambda: Le(a, I)) + raises(TypeError, lambda: a <= I) + + +def test_inequalities_cant_sympify_other(): + # see issue 7833 + from operator import gt, lt, ge, le + + bar = "foo" + + for a in (x, S.Zero, S.One/3, pi, I, zoo, oo, -oo, nan, Rational(1, 3)): + for op in (lt, gt, le, ge): + raises(TypeError, lambda: op(a, bar)) + + +def test_ineq_avoid_wild_symbol_flip(): + # see issue #7951, we try to avoid this internally, e.g., by using + # __lt__ instead of "<". + from sympy.core.symbol import Wild + p = symbols('p', cls=Wild) + # x > p might flip, but Gt should not: + assert Gt(x, p) == Gt(x, p, evaluate=False) + # Previously failed as 'p > x': + e = Lt(x, y).subs({y: p}) + assert e == Lt(x, p, evaluate=False) + # Previously failed as 'p <= x': + e = Ge(x, p).doit() + assert e == Ge(x, p, evaluate=False) + + +def test_issue_8245(): + a = S("6506833320952669167898688709329/5070602400912917605986812821504") + assert rel_check(a, a.n(10)) + assert rel_check(a, a.n(20)) + assert rel_check(a, a.n()) + # prec of 31 is enough to fully capture a as mpf + assert Float(a, 31) == Float(str(a.p), '')/Float(str(a.q), '') + for i in range(31): + r = Rational(Float(a, i)) + f = Float(r) + assert (f < a) == (Rational(f) < a) + # test sign handling + assert (-f < -a) == (Rational(-f) < -a) + # test equivalence handling + isa = Float(a.p,'')/Float(a.q,'') + assert isa <= a + assert not isa < a + assert isa >= a + assert not isa > a + assert isa > 0 + + a = sqrt(2) + r = Rational(str(a.n(30))) + assert rel_check(a, r) + + a = sqrt(2) + r = Rational(str(a.n(29))) + assert rel_check(a, r) + + assert Eq(log(cos(2)**2 + sin(2)**2), 0) is S.true + + +def test_issue_8449(): + p = Symbol('p', nonnegative=True) + assert Lt(-oo, p) + assert Ge(-oo, p) is S.false + assert Gt(oo, -p) + assert Le(oo, -p) is S.false + + +def test_simplify_relational(): + assert simplify(x*(y + 1) - x*y - x + 1 < x) == (x > 1) + assert simplify(x*(y + 1) - x*y - x - 1 < x) == (x > -1) + assert simplify(x < x*(y + 1) - x*y - x + 1) == (x < 1) + q, r = symbols("q r") + assert (((-q + r) - (q - r)) <= 0).simplify() == (q >= r) + root2 = sqrt(2) + equation = ((root2 * (-q + r) - root2 * (q - r)) <= 0).simplify() + assert equation == (q >= r) + r = S.One < x + # canonical operations are not the same as simplification, + # so if there is no simplification, canonicalization will + # be done unless the measure forbids it + assert simplify(r) == r.canonical + assert simplify(r, ratio=0) != r.canonical + # this is not a random test; in _eval_simplify + # this will simplify to S.false and that is the + # reason for the 'if r.is_Relational' in Relational's + # _eval_simplify routine + assert simplify(-(2**(pi*Rational(3, 2)) + 6**pi)**(1/pi) + + 2*(2**(pi/2) + 3**pi)**(1/pi) < 0) is S.false + # canonical at least + assert Eq(y, x).simplify() == Eq(x, y) + assert Eq(x - 1, 0).simplify() == Eq(x, 1) + assert Eq(x - 1, x).simplify() == S.false + assert Eq(2*x - 1, x).simplify() == Eq(x, 1) + assert Eq(2*x, 4).simplify() == Eq(x, 2) + z = cos(1)**2 + sin(1)**2 - 1 # z.is_zero is None + assert Eq(z*x, 0).simplify() == S.true + + assert Ne(y, x).simplify() == Ne(x, y) + assert Ne(x - 1, 0).simplify() == Ne(x, 1) + assert Ne(x - 1, x).simplify() == S.true + assert Ne(2*x - 1, x).simplify() == Ne(x, 1) + assert Ne(2*x, 4).simplify() == Ne(x, 2) + assert Ne(z*x, 0).simplify() == S.false + + # No real-valued assumptions + assert Ge(y, x).simplify() == Le(x, y) + assert Ge(x - 1, 0).simplify() == Ge(x, 1) + assert Ge(x - 1, x).simplify() == S.false + assert Ge(2*x - 1, x).simplify() == Ge(x, 1) + assert Ge(2*x, 4).simplify() == Ge(x, 2) + assert Ge(z*x, 0).simplify() == S.true + assert Ge(x, -2).simplify() == Ge(x, -2) + assert Ge(-x, -2).simplify() == Le(x, 2) + assert Ge(x, 2).simplify() == Ge(x, 2) + assert Ge(-x, 2).simplify() == Le(x, -2) + + assert Le(y, x).simplify() == Ge(x, y) + assert Le(x - 1, 0).simplify() == Le(x, 1) + assert Le(x - 1, x).simplify() == S.true + assert Le(2*x - 1, x).simplify() == Le(x, 1) + assert Le(2*x, 4).simplify() == Le(x, 2) + assert Le(z*x, 0).simplify() == S.true + assert Le(x, -2).simplify() == Le(x, -2) + assert Le(-x, -2).simplify() == Ge(x, 2) + assert Le(x, 2).simplify() == Le(x, 2) + assert Le(-x, 2).simplify() == Ge(x, -2) + + assert Gt(y, x).simplify() == Lt(x, y) + assert Gt(x - 1, 0).simplify() == Gt(x, 1) + assert Gt(x - 1, x).simplify() == S.false + assert Gt(2*x - 1, x).simplify() == Gt(x, 1) + assert Gt(2*x, 4).simplify() == Gt(x, 2) + assert Gt(z*x, 0).simplify() == S.false + assert Gt(x, -2).simplify() == Gt(x, -2) + assert Gt(-x, -2).simplify() == Lt(x, 2) + assert Gt(x, 2).simplify() == Gt(x, 2) + assert Gt(-x, 2).simplify() == Lt(x, -2) + + assert Lt(y, x).simplify() == Gt(x, y) + assert Lt(x - 1, 0).simplify() == Lt(x, 1) + assert Lt(x - 1, x).simplify() == S.true + assert Lt(2*x - 1, x).simplify() == Lt(x, 1) + assert Lt(2*x, 4).simplify() == Lt(x, 2) + assert Lt(z*x, 0).simplify() == S.false + assert Lt(x, -2).simplify() == Lt(x, -2) + assert Lt(-x, -2).simplify() == Gt(x, 2) + assert Lt(x, 2).simplify() == Lt(x, 2) + assert Lt(-x, 2).simplify() == Gt(x, -2) + + # Test particular branches of _eval_simplify + m = exp(1) - exp_polar(1) + assert simplify(m*x > 1) is S.false + # These two test the same branch + assert simplify(m*x + 2*m*y > 1) is S.false + assert simplify(m*x + y > 1 + y) is S.false + + +def test_equals(): + w, x, y, z = symbols('w:z') + f = Function('f') + assert Eq(x, 1).equals(Eq(x*(y + 1) - x*y - x + 1, x)) + assert Eq(x, y).equals(x < y, True) == False + assert Eq(x, f(1)).equals(Eq(x, f(2)), True) == f(1) - f(2) + assert Eq(f(1), y).equals(Eq(f(2), y), True) == f(1) - f(2) + assert Eq(x, f(1)).equals(Eq(f(2), x), True) == f(1) - f(2) + assert Eq(f(1), x).equals(Eq(x, f(2)), True) == f(1) - f(2) + assert Eq(w, x).equals(Eq(y, z), True) == False + assert Eq(f(1), f(2)).equals(Eq(f(3), f(4)), True) == f(1) - f(3) + assert (x < y).equals(y > x, True) == True + assert (x < y).equals(y >= x, True) == False + assert (x < y).equals(z < y, True) == False + assert (x < y).equals(x < z, True) == False + assert (x < f(1)).equals(x < f(2), True) == f(1) - f(2) + assert (f(1) < x).equals(f(2) < x, True) == f(1) - f(2) + + +def test_reversed(): + assert (x < y).reversed == (y > x) + assert (x <= y).reversed == (y >= x) + assert Eq(x, y, evaluate=False).reversed == Eq(y, x, evaluate=False) + assert Ne(x, y, evaluate=False).reversed == Ne(y, x, evaluate=False) + assert (x >= y).reversed == (y <= x) + assert (x > y).reversed == (y < x) + + +def test_canonical(): + c = [i.canonical for i in ( + x + y < z, + x + 2 > 3, + x < 2, + S(2) > x, + x**2 > -x/y, + Gt(3, 2, evaluate=False) + )] + assert [i.canonical for i in c] == c + assert [i.reversed.canonical for i in c] == c + assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c) + + c = [i.reversed.func(i.rhs, i.lhs, evaluate=False).canonical for i in c] + assert [i.canonical for i in c] == c + assert [i.reversed.canonical for i in c] == c + assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c) + assert Eq(y < x, x > y).canonical is S.true + + +@XFAIL +def test_issue_8444_nonworkingtests(): + x = symbols('x', real=True) + assert (x <= oo) == (x >= -oo) == True + + x = symbols('x') + assert x >= floor(x) + assert (x < floor(x)) == False + assert x <= ceiling(x) + assert (x > ceiling(x)) == False + + +def test_issue_8444_workingtests(): + x = symbols('x') + assert Gt(x, floor(x)) == Gt(x, floor(x), evaluate=False) + assert Ge(x, floor(x)) == Ge(x, floor(x), evaluate=False) + assert Lt(x, ceiling(x)) == Lt(x, ceiling(x), evaluate=False) + assert Le(x, ceiling(x)) == Le(x, ceiling(x), evaluate=False) + i = symbols('i', integer=True) + assert (i > floor(i)) == False + assert (i < ceiling(i)) == False + + +def test_issue_10304(): + d = cos(1)**2 + sin(1)**2 - 1 + assert d.is_comparable is False # if this fails, find a new d + e = 1 + d*I + assert simplify(Eq(e, 0)) is S.false + + +def test_issue_18412(): + d = (Rational(1, 6) + z / 4 / y) + assert Eq(x, pi * y**3 * d).replace(y**3, z) == Eq(x, pi * z * d) + + +def test_issue_10401(): + x = symbols('x') + fin = symbols('inf', finite=True) + inf = symbols('inf', infinite=True) + inf2 = symbols('inf2', infinite=True) + infx = symbols('infx', infinite=True, extended_real=True) + # Used in the commented tests below: + #infx2 = symbols('infx2', infinite=True, extended_real=True) + infnx = symbols('inf~x', infinite=True, extended_real=False) + infnx2 = symbols('inf~x2', infinite=True, extended_real=False) + infp = symbols('infp', infinite=True, extended_positive=True) + infp1 = symbols('infp1', infinite=True, extended_positive=True) + infn = symbols('infn', infinite=True, extended_negative=True) + zero = symbols('z', zero=True) + nonzero = symbols('nz', zero=False, finite=True) + + assert Eq(1/(1/x + 1), 1).func is Eq + assert Eq(1/(1/x + 1), 1).subs(x, S.ComplexInfinity) is S.true + assert Eq(1/(1/fin + 1), 1) is S.false + + T, F = S.true, S.false + assert Eq(fin, inf) is F + assert Eq(inf, inf2) not in (T, F) and inf != inf2 + assert Eq(1 + inf, 2 + inf2) not in (T, F) and inf != inf2 + assert Eq(infp, infp1) is T + assert Eq(infp, infn) is F + assert Eq(1 + I*oo, I*oo) is F + assert Eq(I*oo, 1 + I*oo) is F + assert Eq(1 + I*oo, 2 + I*oo) is F + assert Eq(1 + I*oo, 2 + I*infx) is F + assert Eq(1 + I*oo, 2 + infx) is F + # FIXME: The test below fails because (-infx).is_extended_positive is True + # (should be None) + #assert Eq(1 + I*infx, 1 + I*infx2) not in (T, F) and infx != infx2 + # + assert Eq(zoo, sqrt(2) + I*oo) is F + assert Eq(zoo, oo) is F + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + assert Eq(i*I, r) not in (T, F) + assert Eq(infx, infnx) is F + assert Eq(infnx, infnx2) not in (T, F) and infnx != infnx2 + assert Eq(zoo, oo) is F + assert Eq(inf/inf2, 0) is F + assert Eq(inf/fin, 0) is F + assert Eq(fin/inf, 0) is T + assert Eq(zero/nonzero, 0) is T and ((zero/nonzero) != 0) + # The commented out test below is incorrect because: + assert zoo == -zoo + assert Eq(zoo, -zoo) is T + assert Eq(oo, -oo) is F + assert Eq(inf, -inf) not in (T, F) + + assert Eq(fin/(fin + 1), 1) is S.false + + o = symbols('o', odd=True) + assert Eq(o, 2*o) is S.false + + p = symbols('p', positive=True) + assert Eq(p/(p - 1), 1) is F + + +def test_issue_10633(): + assert Eq(True, False) == False + assert Eq(False, True) == False + assert Eq(True, True) == True + assert Eq(False, False) == True + + +def test_issue_10927(): + x = symbols('x') + assert str(Eq(x, oo)) == 'Eq(x, oo)' + assert str(Eq(x, -oo)) == 'Eq(x, -oo)' + + +def test_issues_13081_12583_12534(): + # 13081 + r = Rational('905502432259640373/288230376151711744') + assert (r < pi) is S.false + assert (r > pi) is S.true + # 12583 + v = sqrt(2) + u = sqrt(v) + 2/sqrt(10 - 8/sqrt(2 - v) + 4*v*(1/sqrt(2 - v) - 1)) + assert (u >= 0) is S.true + # 12534; Rational vs NumberSymbol + # here are some precisions for which Rational forms + # at a lower and higher precision bracket the value of pi + # e.g. for p = 20: + # Rational(pi.n(p + 1)).n(25) = 3.14159265358979323846 2834 + # pi.n(25) = 3.14159265358979323846 2643 + # Rational(pi.n(p )).n(25) = 3.14159265358979323846 1987 + assert [p for p in range(20, 50) if + (Rational(pi.n(p)) < pi) and + (pi < Rational(pi.n(p + 1)))] == [20, 24, 27, 33, 37, 43, 48] + # pick one such precision and affirm that the reversed operation + # gives the opposite result, i.e. if x < y is true then x > y + # must be false + for i in (20, 21): + v = pi.n(i) + assert rel_check(Rational(v), pi) + assert rel_check(v, pi) + assert rel_check(pi.n(20), pi.n(21)) + # Float vs Rational + # the rational form is less than the floating representation + # at the same precision + assert [i for i in range(15, 50) if Rational(pi.n(i)) > pi.n(i)] == [] + # this should be the same if we reverse the relational + assert [i for i in range(15, 50) if pi.n(i) < Rational(pi.n(i))] == [] + +def test_issue_18188(): + from sympy.sets.conditionset import ConditionSet + result1 = Eq(x*cos(x) - 3*sin(x), 0) + assert result1.as_set() == ConditionSet(x, Eq(x*cos(x) - 3*sin(x), 0), Reals) + + result2 = Eq(x**2 + sqrt(x*2) + sin(x), 0) + assert result2.as_set() == ConditionSet(x, Eq(sqrt(2)*sqrt(x) + x**2 + sin(x), 0), Reals) + +def test_binary_symbols(): + ans = {x} + for f in Eq, Ne: + for t in S.true, S.false: + eq = f(x, S.true) + assert eq.binary_symbols == ans + assert eq.reversed.binary_symbols == ans + assert f(x, 1).binary_symbols == set() + + +def test_rel_args(): + # can't have Boolean args; this is automatic for True/False + # with Python 3 and we confirm that SymPy does the same + # for true/false + for op in ['<', '<=', '>', '>=']: + for b in (S.true, x < 1, And(x, y)): + for v in (0.1, 1, 2**32, t, S.One): + raises(TypeError, lambda: Relational(b, v, op)) + + +def test_nothing_happens_to_Eq_condition_during_simplify(): + # issue 25701 + r = symbols('r', real=True) + assert Eq(2*sign(r + 3)/(5*Abs(r + 3)**Rational(3, 5)), 0 + ).simplify() == Eq(Piecewise( + (0, Eq(r, -3)), ((r + 3)/(5*Abs((r + 3)**Rational(8, 5)))*2, True)), 0) + + +def test_issue_15847(): + a = Ne(x*(x + y), x**2 + x*y) + assert simplify(a) == False + + +def test_negated_property(): + eq = Eq(x, y) + assert eq.negated == Ne(x, y) + + eq = Ne(x, y) + assert eq.negated == Eq(x, y) + + eq = Ge(x + y, y - x) + assert eq.negated == Lt(x + y, y - x) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).negated.negated == f(x, y) + + +def test_reversedsign_property(): + eq = Eq(x, y) + assert eq.reversedsign == Eq(-x, -y) + + eq = Ne(x, y) + assert eq.reversedsign == Ne(-x, -y) + + eq = Ge(x + y, y - x) + assert eq.reversedsign == Le(-x - y, x - y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).reversedsign.reversedsign == f(x, y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, y).reversedsign.reversedsign == f(-x, y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, -y).reversedsign.reversedsign == f(x, -y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, -y).reversedsign.reversedsign == f(-x, -y) + + +def test_reversed_reversedsign_property(): + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).reversed.reversedsign == f(x, y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, y).reversed.reversedsign == f(-x, y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, -y).reversed.reversedsign == f(x, -y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, -y).reversed.reversedsign == \ + f(-x, -y).reversedsign.reversed + + +def test_improved_canonical(): + def test_different_forms(listofforms): + for form1, form2 in combinations(listofforms, 2): + assert form1.canonical == form2.canonical + + def generate_forms(expr): + return [expr, expr.reversed, expr.reversedsign, + expr.reversed.reversedsign] + + test_different_forms(generate_forms(x > -y)) + test_different_forms(generate_forms(x >= -y)) + test_different_forms(generate_forms(Eq(x, -y))) + test_different_forms(generate_forms(Ne(x, -y))) + test_different_forms(generate_forms(pi < x)) + test_different_forms(generate_forms(pi - 5*y < -x + 2*y**2 - 7)) + + assert (pi >= x).canonical == (x <= pi) + + +def test_set_equality_canonical(): + a, b, c = symbols('a b c') + + A = Eq(FiniteSet(a, b, c), FiniteSet(1, 2, 3)) + B = Ne(FiniteSet(a, b, c), FiniteSet(4, 5, 6)) + + assert A.canonical == A.reversed + assert B.canonical == B.reversed + + +def test_trigsimp(): + # issue 16736 + s, c = sin(2*x), cos(2*x) + eq = Eq(s, c) + assert trigsimp(eq) == eq # no rearrangement of sides + # simplification of sides might result in + # an unevaluated Eq + changed = trigsimp(Eq(s + c, sqrt(2))) + assert isinstance(changed, Eq) + assert changed.subs(x, pi/8) is S.true + # or an evaluated one + assert trigsimp(Eq(cos(x)**2 + sin(x)**2, 1)) is S.true + + +def test_polynomial_relation_simplification(): + assert Ge(3*x*(x + 1) + 4, 3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))] + assert Le(-(3*x*(x + 1) + 4), -3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))] + assert ((x**2+3)*(x**2-1)+3*x >= 2*x**2).simplify() in [(x**4 + 3*x >= 3), (-x**4 - 3*x <= -3)] + + +def test_multivariate_linear_function_simplification(): + assert Ge(x + y, x - y).simplify() == Ge(y, 0) + assert Le(-x + y, -x - y).simplify() == Le(y, 0) + assert Eq(2*x + y, 2*x + y - 3).simplify() == False + assert (2*x + y > 2*x + y - 3).simplify() == True + assert (2*x + y < 2*x + y - 3).simplify() == False + assert (2*x + y < 2*x + y + 3).simplify() == True + a, b, c, d, e, f, g = symbols('a b c d e f g') + assert Lt(a + b + c + 2*d, 3*d - f + g). simplify() == Lt(a, -b - c + d - f + g) + + +def test_nonpolymonial_relations(): + assert Eq(cos(x), 0).simplify() == Eq(cos(x), 0) + +def test_18778(): + raises(TypeError, lambda: is_le(Basic(), Basic())) + raises(TypeError, lambda: is_gt(Basic(), Basic())) + raises(TypeError, lambda: is_ge(Basic(), Basic())) + raises(TypeError, lambda: is_lt(Basic(), Basic())) + +def test_EvalEq(): + """ + + This test exists to ensure backwards compatibility. + The method to use is _eval_is_eq + """ + from sympy.core.expr import Expr + + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(PowTest, _sympify(base), _sympify(exp)) + + def _eval_Eq(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return lhs.args[0] == rhs.args[0] and lhs.args[1] == rhs.args[1] + + assert is_eq(PowTest(3, 4), PowTest(3,4)) + assert is_eq(PowTest(3, 4), _sympify(4)) is None + assert is_neq(PowTest(3, 4), PowTest(3,7)) + + +def test_is_eq(): + # test assumptions + assert is_eq(x, y, Q.infinite(x) & Q.finite(y)) is False + assert is_eq(x, y, Q.infinite(x) & Q.infinite(y) & Q.extended_real(x) & ~Q.extended_real(y)) is False + assert is_eq(x, y, Q.infinite(x) & Q.infinite(y) & Q.extended_positive(x) & Q.extended_negative(y)) is False + + assert is_eq(x+I, y+I, Q.infinite(x) & Q.finite(y)) is False + assert is_eq(1+x*I, 1+y*I, Q.infinite(x) & Q.finite(y)) is False + + assert is_eq(x, S(0), assumptions=Q.zero(x)) + assert is_eq(x, S(0), assumptions=~Q.zero(x)) is False + assert is_eq(x, S(0), assumptions=Q.nonzero(x)) is False + assert is_neq(x, S(0), assumptions=Q.zero(x)) is False + assert is_neq(x, S(0), assumptions=~Q.zero(x)) + assert is_neq(x, S(0), assumptions=Q.nonzero(x)) + + # test registration + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(cls, _sympify(base), _sympify(exp)) + + @dispatch(PowTest, PowTest) + def _eval_is_eq(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return fuzzy_and([is_eq(lhs.args[0], rhs.args[0]), is_eq(lhs.args[1], rhs.args[1])]) + + assert is_eq(PowTest(3, 4), PowTest(3,4)) + assert is_eq(PowTest(3, 4), _sympify(4)) is None + assert is_neq(PowTest(3, 4), PowTest(3,7)) + + +def test_is_ge_le(): + # test assumptions + assert is_ge(x, S(0), Q.nonnegative(x)) is True + assert is_ge(x, S(0), Q.negative(x)) is False + + # test registration + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(cls, _sympify(base), _sympify(exp)) + + @dispatch(PowTest, PowTest) + def _eval_is_ge(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return fuzzy_and([is_ge(lhs.args[0], rhs.args[0]), is_ge(lhs.args[1], rhs.args[1])]) + + assert is_ge(PowTest(3, 9), PowTest(3,2)) + assert is_gt(PowTest(3, 9), PowTest(3,2)) + assert is_le(PowTest(3, 2), PowTest(3,9)) + assert is_lt(PowTest(3, 2), PowTest(3,9)) + + +def test_weak_strict(): + for func in (Eq, Ne): + eq = func(x, 1) + assert eq.strict == eq.weak == eq + eq = Gt(x, 1) + assert eq.weak == Ge(x, 1) + assert eq.strict == eq + eq = Lt(x, 1) + assert eq.weak == Le(x, 1) + assert eq.strict == eq + eq = Ge(x, 1) + assert eq.strict == Gt(x, 1) + assert eq.weak == eq + eq = Le(x, 1) + assert eq.strict == Lt(x, 1) + assert eq.weak == eq + + +def test_issue_23731(): + i = symbols('i', integer=True) + assert unchanged(Eq, i, 1.0) + assert unchanged(Eq, i/2, 0.5) + ni = symbols('ni', integer=False) + assert Eq(ni, 1) == False + assert unchanged(Eq, ni, .1) + assert Eq(ni, 1.0) == False + nr = symbols('nr', rational=False) + assert Eq(nr, .1) == False + + +def test_rewrite_Add(): + from sympy.testing.pytest import warns_deprecated_sympy + with warns_deprecated_sympy(): + assert Eq(x, y).rewrite(Add) == x - y diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_rules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_rules.py new file mode 100644 index 0000000000000000000000000000000000000000..31cb88b52db21f39653033b4567526e992be99f0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_rules.py @@ -0,0 +1,14 @@ +from sympy.core.rules import Transform + +from sympy.testing.pytest import raises + + +def test_Transform(): + add1 = Transform(lambda x: x + 1, lambda x: x % 2 == 1) + assert add1[1] == 2 + assert (1 in add1) is True + assert add1.get(1) == 2 + + raises(KeyError, lambda: add1[2]) + assert (2 in add1) is False + assert add1.get(2) is None diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py new file mode 100644 index 0000000000000000000000000000000000000000..893713f27d74b884391ad800d186eafe5337ab1c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py @@ -0,0 +1,76 @@ +from sympy.core.basic import Basic +from sympy.core.numbers import Rational +from sympy.core.singleton import S, Singleton + +def test_Singleton(): + + class MySingleton(Basic, metaclass=Singleton): + pass + + MySingleton() # force instantiation + assert MySingleton() is not Basic() + assert MySingleton() is MySingleton() + assert S.MySingleton is MySingleton() + + class MySingleton_sub(MySingleton): + pass + + MySingleton_sub() + assert MySingleton_sub() is not MySingleton() + assert MySingleton_sub() is MySingleton_sub() + +def test_singleton_redefinition(): + class TestSingleton(Basic, metaclass=Singleton): + pass + + assert TestSingleton() is S.TestSingleton + + class TestSingleton(Basic, metaclass=Singleton): + pass + + assert TestSingleton() is S.TestSingleton + +def test_names_in_namespace(): + # Every singleton name should be accessible from the 'from sympy import *' + # namespace in addition to the S object. However, it does not need to be + # by the same name (e.g., oo instead of S.Infinity). + + # As a general rule, things should only be added to the singleton registry + # if they are used often enough that code can benefit either from the + # performance benefit of being able to use 'is' (this only matters in very + # tight loops), or from the memory savings of having exactly one instance + # (this matters for the numbers singletons, but very little else). The + # singleton registry is already a bit overpopulated, and things cannot be + # removed from it without breaking backwards compatibility. So if you got + # here by adding something new to the singletons, ask yourself if it + # really needs to be singletonized. Note that SymPy classes compare to one + # another just fine, so Class() == Class() will give True even if each + # Class() returns a new instance. Having unique instances is only + # necessary for the above noted performance gains. It should not be needed + # for any behavioral purposes. + + # If you determine that something really should be a singleton, it must be + # accessible to sympify() without using 'S' (hence this test). Also, its + # str printer should print a form that does not use S. This is because + # sympify() disables attribute lookups by default for safety purposes. + d = {} + exec('from sympy import *', d) + + for name in dir(S) + list(S._classes_to_install): + if name.startswith('_'): + continue + if name == 'register': + continue + if isinstance(getattr(S, name), Rational): + continue + if getattr(S, name).__module__.startswith('sympy.physics'): + continue + if name in ['MySingleton', 'MySingleton_sub', 'TestSingleton']: + # From the tests above + continue + if name == 'NegativeInfinity': + # Accessible by -oo + continue + + # Use is here to ensure it is the exact same object + assert any(getattr(S, name) is i for i in d.values()), name diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py new file mode 100644 index 0000000000000000000000000000000000000000..a18dbfb624552cf2fa11bb7f3c3a9e865caeb0c4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py @@ -0,0 +1,28 @@ +from sympy.core.sorting import default_sort_key, ordered +from sympy.testing.pytest import raises + +from sympy.abc import x + + +def test_default_sort_key(): + func = lambda x: x + assert sorted([func, x, func], key=default_sort_key) == [func, func, x] + + class C: + def __repr__(self): + return 'x.y' + func = C() + assert sorted([x, func], key=default_sort_key) == [func, x] + + +def test_ordered(): + # Issue 7210 - this had been failing with python2/3 problems + assert (list(ordered([{1:3, 2:4, 9:10}, {1:3}])) == \ + [{1: 3}, {1: 3, 2: 4, 9: 10}]) + # warnings should not be raised for identical items + l = [1, 1] + assert list(ordered(l, warn=True)) == l + l = [[1], [2], [1]] + assert list(ordered(l, warn=True)) == [[1], [1], [2]] + raises(ValueError, lambda: list(ordered(['a', 'ab'], keys=[lambda x: x[0]], + default=False, warn=True))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_subs.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_subs.py new file mode 100644 index 0000000000000000000000000000000000000000..0803a4b1b5e93b8a35f43516ccef3ab9a16f08ec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_subs.py @@ -0,0 +1,895 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.function import (Derivative, Function, Lambda, Subs) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, oo, pi, zoo) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.core.sympify import SympifyError +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (atan2, cos, cot, sin, tan) +from sympy.matrices.dense import (Matrix, zeros) +from sympy.matrices.expressions.special import ZeroMatrix +from sympy.polys.polytools import factor +from sympy.polys.rootoftools import RootOf +from sympy.simplify.cse_main import cse +from sympy.simplify.simplify import nsimplify +from sympy.core.basic import _aresame +from sympy.testing.pytest import XFAIL, raises +from sympy.abc import a, x, y, z, t + + +def test_subs(): + n3 = Rational(3) + e = x + e = e.subs(x, n3) + assert e == Rational(3) + + e = 2*x + assert e == 2*x + e = e.subs(x, n3) + assert e == Rational(6) + + +def test_subs_Matrix(): + z = zeros(2) + z1 = ZeroMatrix(2, 2) + assert (x*y).subs({x:z, y:0}) in [z, z1] + assert (x*y).subs({y:z, x:0}) == 0 + assert (x*y).subs({y:z, x:0}, simultaneous=True) in [z, z1] + assert (x + y).subs({x: z, y: z}, simultaneous=True) in [z, z1] + assert (x + y).subs({x: z, y: z}) in [z, z1] + + # Issue #15528 + assert Mul(Matrix([[3]]), x).subs(x, 2.0) == Matrix([[6.0]]) + # Does not raise a TypeError, see comment on the MatAdd postprocessor + assert Add(Matrix([[3]]), x).subs(x, 2.0) == Add(Matrix([[3]]), 2.0) + + +def test_subs_AccumBounds(): + e = x + e = e.subs(x, AccumBounds(1, 3)) + assert e == AccumBounds(1, 3) + + e = 2*x + e = e.subs(x, AccumBounds(1, 3)) + assert e == AccumBounds(2, 6) + + e = x + x**2 + e = e.subs(x, AccumBounds(-1, 1)) + assert e == AccumBounds(-1, 2) + + +def test_trigonometric(): + n3 = Rational(3) + e = (sin(x)**2).diff(x) + assert e == 2*sin(x)*cos(x) + e = e.subs(x, n3) + assert e == 2*cos(n3)*sin(n3) + + e = (sin(x)**2).diff(x) + assert e == 2*sin(x)*cos(x) + e = e.subs(sin(x), cos(x)) + assert e == 2*cos(x)**2 + + assert exp(pi).subs(exp, sin) == 0 + assert cos(exp(pi)).subs(exp, sin) == 1 + + i = Symbol('i', integer=True) + zoo = S.ComplexInfinity + assert tan(x).subs(x, pi/2) is zoo + assert cot(x).subs(x, pi) is zoo + assert cot(i*x).subs(x, pi) is zoo + assert tan(i*x).subs(x, pi/2) == tan(i*pi/2) + assert tan(i*x).subs(x, pi/2).subs(i, 1) is zoo + o = Symbol('o', odd=True) + assert tan(o*x).subs(x, pi/2) == tan(o*pi/2) + + +def test_powers(): + assert sqrt(1 - sqrt(x)).subs(x, 4) == I + assert (sqrt(1 - x**2)**3).subs(x, 2) == - 3*I*sqrt(3) + assert (x**Rational(1, 3)).subs(x, 27) == 3 + assert (x**Rational(1, 3)).subs(x, -27) == 3*(-1)**Rational(1, 3) + assert ((-x)**Rational(1, 3)).subs(x, 27) == 3*(-1)**Rational(1, 3) + n = Symbol('n', negative=True) + assert (x**n).subs(x, 0) is S.ComplexInfinity + assert exp(-1).subs(S.Exp1, 0) is S.ComplexInfinity + assert (x**(4.0*y)).subs(x**(2.0*y), n) == n**2.0 + assert (2**(x + 2)).subs(2, 3) == 3**(x + 3) + + +def test_logexppow(): # no eval() + x = Symbol('x', real=True) + w = Symbol('w') + e = (3**(1 + x) + 2**(1 + x))/(3**x + 2**x) + assert e.subs(2**x, w) != e + assert e.subs(exp(x*log(Rational(2))), w) != e + + +def test_bug(): + x1 = Symbol('x1') + x2 = Symbol('x2') + y = x1*x2 + assert y.subs(x1, Float(3.0)) == Float(3.0)*x2 + + +def test_subbug1(): + # see that they don't fail + (x**x).subs(x, 1) + (x**x).subs(x, 1.0) + + +def test_subbug2(): + # Ensure this does not cause infinite recursion + assert Float(7.7).epsilon_eq(abs(x).subs(x, -7.7)) + + +def test_dict_set(): + a, b, c = map(Wild, 'abc') + + f = 3*cos(4*x) + r = f.match(a*cos(b*x)) + assert r == {a: 3, b: 4} + e = a/b*sin(b*x) + assert e.subs(r) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(r) == 3*sin(4*x) / 4 + s = set(r.items()) + assert e.subs(s) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(s) == 3*sin(4*x) / 4 + + assert e.subs(r) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(r) == 3*sin(4*x) / 4 + assert x.subs(Dict((x, 1))) == 1 + + +def test_dict_ambigous(): # see issue 3566 + f = x*exp(x) + g = z*exp(z) + + df = {x: y, exp(x): y} + dg = {z: y, exp(z): y} + + assert f.subs(df) == y**2 + assert g.subs(dg) == y**2 + + # and this is how order can affect the result + assert f.subs(x, y).subs(exp(x), y) == y*exp(y) + assert f.subs(exp(x), y).subs(x, y) == y**2 + + # length of args and count_ops are the same so + # default_sort_key resolves ordering...if one + # doesn't want this result then an unordered + # sequence should not be used. + e = 1 + x*y + assert e.subs({x: y, y: 2}) == 5 + # here, there are no obviously clashing keys or values + # but the results depend on the order + assert exp(x/2 + y).subs({exp(y + 1): 2, x: 2}) == exp(y + 1) + + +def test_deriv_sub_bug3(): + f = Function('f') + pat = Derivative(f(x), x, x) + assert pat.subs(y, y**2) == Derivative(f(x), x, x) + assert pat.subs(y, y**2) != Derivative(f(x), x) + + +def test_equality_subs1(): + f = Function('f') + eq = Eq(f(x)**2, x) + res = Eq(Integer(16), x) + assert eq.subs(f(x), 4) == res + + +def test_equality_subs2(): + f = Function('f') + eq = Eq(f(x)**2, 16) + assert bool(eq.subs(f(x), 3)) is False + assert bool(eq.subs(f(x), 4)) is True + + +def test_issue_3742(): + e = sqrt(x)*exp(y) + assert e.subs(sqrt(x), 1) == exp(y) + + +def test_subs_dict1(): + assert (1 + x*y).subs(x, pi) == 1 + pi*y + assert (1 + x*y).subs({x: pi, y: 2}) == 1 + 2*pi + + c2, c3, q1p, q2p, c1, s1, s2, s3 = symbols('c2 c3 q1p q2p c1 s1 s2 s3') + test = (c2**2*q2p*c3 + c1**2*s2**2*q2p*c3 + s1**2*s2**2*q2p*c3 + - c1**2*q1p*c2*s3 - s1**2*q1p*c2*s3) + assert (test.subs({c1**2: 1 - s1**2, c2**2: 1 - s2**2, c3**3: 1 - s3**2}) + == c3*q2p*(1 - s2**2) + c3*q2p*s2**2*(1 - s1**2) + - c2*q1p*s3*(1 - s1**2) + c3*q2p*s1**2*s2**2 - c2*q1p*s3*s1**2) + + +def test_mul(): + x, y, z, a, b, c = symbols('x y z a b c') + A, B, C = symbols('A B C', commutative=0) + assert (x*y*z).subs(z*x, y) == y**2 + assert (z*x).subs(1/x, z) == 1 + assert (x*y/z).subs(1/z, a) == a*x*y + assert (x*y/z).subs(x/z, a) == a*y + assert (x*y/z).subs(y/z, a) == a*x + assert (x*y/z).subs(x/z, 1/a) == y/a + assert (x*y/z).subs(x, 1/a) == y/(z*a) + assert (2*x*y).subs(5*x*y, z) != z*Rational(2, 5) + assert (x*y*A).subs(x*y, a) == a*A + assert (x**2*y**(x*Rational(3, 2))).subs(x*y**(x/2), 2) == 4*y**(x/2) + assert (x*exp(x*2)).subs(x*exp(x), 2) == 2*exp(x) + assert ((x**(2*y))**3).subs(x**y, 2) == 64 + assert (x*A*B).subs(x*A, y) == y*B + assert (x*y*(1 + x)*(1 + x*y)).subs(x*y, 2) == 6*(1 + x) + assert ((1 + A*B)*A*B).subs(A*B, x*A*B) + assert (x*a/z).subs(x/z, A) == a*A + assert (x**3*A).subs(x**2*A, a) == a*x + assert (x**2*A*B).subs(x**2*B, a) == a*A + assert (x**2*A*B).subs(x**2*A, a) == a*B + assert (b*A**3/(a**3*c**3)).subs(a**4*c**3*A**3/b**4, z) == \ + b*A**3/(a**3*c**3) + assert (6*x).subs(2*x, y) == 3*y + assert (y*exp(x*Rational(3, 2))).subs(y*exp(x), 2) == 2*exp(x/2) + assert (y*exp(x*Rational(3, 2))).subs(y*exp(x), 2) == 2*exp(x/2) + assert (A**2*B*A**2*B*A**2).subs(A*B*A, C) == A*C**2*A + assert (x*A**3).subs(x*A, y) == y*A**2 + assert (x**2*A**3).subs(x*A, y) == y**2*A + assert (x*A**3).subs(x*A, B) == B*A**2 + assert (x*A*B*A*exp(x*A*B)).subs(x*A, B) == B**2*A*exp(B*B) + assert (x**2*A*B*A*exp(x*A*B)).subs(x*A, B) == B**3*exp(B**2) + assert (x**3*A*exp(x*A*B)*A*exp(x*A*B)).subs(x*A, B) == \ + x*B*exp(B**2)*B*exp(B**2) + assert (x*A*B*C*A*B).subs(x*A*B, C) == C**2*A*B + assert (-I*a*b).subs(a*b, 2) == -2*I + + # issue 6361 + assert (-8*I*a).subs(-2*a, 1) == 4*I + assert (-I*a).subs(-a, 1) == I + + # issue 6441 + assert (4*x**2).subs(2*x, y) == y**2 + assert (2*4*x**2).subs(2*x, y) == 2*y**2 + assert (-x**3/9).subs(-x/3, z) == -z**2*x + assert (-x**3/9).subs(x/3, z) == -z**2*x + assert (-2*x**3/9).subs(x/3, z) == -2*x*z**2 + assert (-2*x**3/9).subs(-x/3, z) == -2*x*z**2 + assert (-2*x**3/9).subs(-2*x, z) == z*x**2/9 + assert (-2*x**3/9).subs(2*x, z) == -z*x**2/9 + assert (2*(3*x/5/7)**2).subs(3*x/5, z) == 2*(Rational(1, 7))**2*z**2 + assert (4*x).subs(-2*x, z) == 4*x # try keep subs literal + + +def test_subs_simple(): + a = symbols('a', commutative=True) + x = symbols('x', commutative=False) + + assert (2*a).subs(1, 3) == 2*a + assert (2*a).subs(2, 3) == 3*a + assert (2*a).subs(a, 3) == 6 + assert sin(2).subs(1, 3) == sin(2) + assert sin(2).subs(2, 3) == sin(3) + assert sin(a).subs(a, 3) == sin(3) + + assert (2*x).subs(1, 3) == 2*x + assert (2*x).subs(2, 3) == 3*x + assert (2*x).subs(x, 3) == 6 + assert sin(x).subs(x, 3) == sin(3) + + +def test_subs_constants(): + a, b = symbols('a b', commutative=True) + x, y = symbols('x y', commutative=False) + + assert (a*b).subs(2*a, 1) == a*b + assert (1.5*a*b).subs(a, 1) == 1.5*b + assert (2*a*b).subs(2*a, 1) == b + assert (2*a*b).subs(4*a, 1) == 2*a*b + + assert (x*y).subs(2*x, 1) == x*y + assert (1.5*x*y).subs(x, 1) == 1.5*y + assert (2*x*y).subs(2*x, 1) == y + assert (2*x*y).subs(4*x, 1) == 2*x*y + + +def test_subs_commutative(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + + assert (a*b).subs(a*b, K) == K + assert (a*b*a*b).subs(a*b, K) == K**2 + assert (a*a*b*b).subs(a*b, K) == K**2 + assert (a*b*c*d).subs(a*b*c, K) == d*K + assert (a*b**c).subs(a, K) == K*b**c + assert (a*b**c).subs(b, K) == a*K**c + assert (a*b**c).subs(c, K) == a*b**K + assert (a*b*c*b*a).subs(a*b, K) == c*K**2 + assert (a**3*b**2*a).subs(a*b, K) == a**2*K**2 + + +def test_subs_noncommutative(): + w, x, y, z, L = symbols('w x y z L', commutative=False) + alpha = symbols('alpha', commutative=True) + someint = symbols('someint', commutative=True, integer=True) + + assert (x*y).subs(x*y, L) == L + assert (w*y*x).subs(x*y, L) == w*y*x + assert (w*x*y*z).subs(x*y, L) == w*L*z + assert (x*y*x*y).subs(x*y, L) == L**2 + assert (x*x*y).subs(x*y, L) == x*L + assert (x*x*y*y).subs(x*y, L) == x*L*y + assert (w*x*y).subs(x*y*z, L) == w*x*y + assert (x*y**z).subs(x, L) == L*y**z + assert (x*y**z).subs(y, L) == x*L**z + assert (x*y**z).subs(z, L) == x*y**L + assert (w*x*y*z*x*y).subs(x*y*z, L) == w*L*x*y + assert (w*x*y*y*w*x*x*y*x*y*y*x*y).subs(x*y, L) == w*L*y*w*x*L**2*y*L + + # Check fractional power substitutions. It should not do + # substitutions that choose a value for noncommutative log, + # or inverses that don't already appear in the expressions. + assert (x*x*x).subs(x*x, L) == L*x + assert (x*x*x*y*x*x*x*x).subs(x*x, L) == L*x*y*L**2 + for p in range(1, 5): + for k in range(10): + assert (y * x**k).subs(x**p, L) == y * L**(k//p) * x**(k % p) + assert (x**Rational(3, 2)).subs(x**S.Half, L) == x**Rational(3, 2) + assert (x**S.Half).subs(x**S.Half, L) == L + assert (x**Rational(-1, 2)).subs(x**S.Half, L) == x**Rational(-1, 2) + assert (x**Rational(-1, 2)).subs(x**Rational(-1, 2), L) == L + + assert (x**(2*someint)).subs(x**someint, L) == L**2 + assert (x**(2*someint + 3)).subs(x**someint, L) == L**2*x**3 + assert (x**(3*someint + 3)).subs(x**someint, L) == L**3*x**3 + assert (x**(3*someint)).subs(x**(2*someint), L) == L * x**someint + assert (x**(4*someint)).subs(x**(2*someint), L) == L**2 + assert (x**(4*someint + 1)).subs(x**(2*someint), L) == L**2 * x + assert (x**(4*someint)).subs(x**(3*someint), L) == L * x**someint + assert (x**(4*someint + 1)).subs(x**(3*someint), L) == L * x**(someint + 1) + + assert (x**(2*alpha)).subs(x**alpha, L) == x**(2*alpha) + assert (x**(2*alpha + 2)).subs(x**2, L) == x**(2*alpha + 2) + assert ((2*z)**alpha).subs(z**alpha, y) == (2*z)**alpha + assert (x**(2*someint*alpha)).subs(x**someint, L) == x**(2*someint*alpha) + assert (x**(2*someint + alpha)).subs(x**someint, L) == x**(2*someint + alpha) + + # This could in principle be substituted, but is not currently + # because it requires recognizing that someint**2 is divisible by + # someint. + assert (x**(someint**2 + 3)).subs(x**someint, L) == x**(someint**2 + 3) + + # alpha**z := exp(log(alpha) z) is usually well-defined + assert (4**z).subs(2**z, y) == y**2 + + # Negative powers + assert (x**(-1)).subs(x**3, L) == x**(-1) + assert (x**(-2)).subs(x**3, L) == x**(-2) + assert (x**(-3)).subs(x**3, L) == L**(-1) + assert (x**(-4)).subs(x**3, L) == L**(-1) * x**(-1) + assert (x**(-5)).subs(x**3, L) == L**(-1) * x**(-2) + + assert (x**(-1)).subs(x**(-3), L) == x**(-1) + assert (x**(-2)).subs(x**(-3), L) == x**(-2) + assert (x**(-3)).subs(x**(-3), L) == L + assert (x**(-4)).subs(x**(-3), L) == L * x**(-1) + assert (x**(-5)).subs(x**(-3), L) == L * x**(-2) + + assert (x**1).subs(x**(-3), L) == x + assert (x**2).subs(x**(-3), L) == x**2 + assert (x**3).subs(x**(-3), L) == L**(-1) + assert (x**4).subs(x**(-3), L) == L**(-1) * x + assert (x**5).subs(x**(-3), L) == L**(-1) * x**2 + + +def test_subs_basic_funcs(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + w, x, y, z, L = symbols('w x y z L', commutative=False) + + assert (x + y).subs(x + y, L) == L + assert (x - y).subs(x - y, L) == L + assert (x/y).subs(x, L) == L/y + assert (x**y).subs(x, L) == L**y + assert (x**y).subs(y, L) == x**L + assert ((a - c)/b).subs(b, K) == (a - c)/K + assert (exp(x*y - z)).subs(x*y, L) == exp(L - z) + assert (a*exp(x*y - w*z) + b*exp(x*y + w*z)).subs(z, 0) == \ + a*exp(x*y) + b*exp(x*y) + assert ((a - b)/(c*d - a*b)).subs(c*d - a*b, K) == (a - b)/K + assert (w*exp(a*b - c)*x*y/4).subs(x*y, L) == w*exp(a*b - c)*L/4 + + +def test_subs_wild(): + R, S, T, U = symbols('R S T U', cls=Wild) + + assert (R*S).subs(R*S, T) == T + assert (S*R).subs(R*S, T) == T + assert (R + S).subs(R + S, T) == T + assert (R**S).subs(R, T) == T**S + assert (R**S).subs(S, T) == R**T + assert (R*S**T).subs(R, U) == U*S**T + assert (R*S**T).subs(S, U) == R*U**T + assert (R*S**T).subs(T, U) == R*S**U + + +def test_subs_mixed(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + w, x, y, z, L = symbols('w x y z L', commutative=False) + R, S, T, U = symbols('R S T U', cls=Wild) + + assert (a*x*y).subs(x*y, L) == a*L + assert (a*b*x*y*x).subs(x*y, L) == a*b*L*x + assert (R*x*y*exp(x*y)).subs(x*y, L) == R*L*exp(L) + assert (a*x*y*y*x - x*y*z*exp(a*b)).subs(x*y, L) == a*L*y*x - L*z*exp(a*b) + e = c*y*x*y*x**(R*S - a*b) - T*(a*R*b*S) + assert e.subs(x*y, L).subs(a*b, K).subs(R*S, U) == \ + c*y*L*x**(U - K) - T*(U*K) + + +def test_division(): + a, b, c = symbols('a b c', commutative=True) + x, y, z = symbols('x y z', commutative=True) + + assert (1/a).subs(a, c) == 1/c + assert (1/a**2).subs(a, c) == 1/c**2 + assert (1/a**2).subs(a, -2) == Rational(1, 4) + assert (-(1/a**2)).subs(a, -2) == Rational(-1, 4) + + assert (1/x).subs(x, z) == 1/z + assert (1/x**2).subs(x, z) == 1/z**2 + assert (1/x**2).subs(x, -2) == Rational(1, 4) + assert (-(1/x**2)).subs(x, -2) == Rational(-1, 4) + + #issue 5360 + assert (1/x).subs(x, 0) == 1/S.Zero + + +def test_add(): + a, b, c, d, x, y, t = symbols('a b c d x y t') + + assert (a**2 - b - c).subs(a**2 - b, d) in [d - c, a**2 - b - c] + assert (a**2 - c).subs(a**2 - c, d) == d + assert (a**2 - b - c).subs(a**2 - c, d) in [d - b, a**2 - b - c] + assert (a**2 - x - c).subs(a**2 - c, d) in [d - x, a**2 - x - c] + assert (a**2 - b - sqrt(a)).subs(a**2 - sqrt(a), c) == c - b + assert (a + b + exp(a + b)).subs(a + b, c) == c + exp(c) + assert (c + b + exp(c + b)).subs(c + b, a) == a + exp(a) + assert (a + b + c + d).subs(b + c, x) == a + d + x + assert (a + b + c + d).subs(-b - c, x) == a + d - x + assert ((x + 1)*y).subs(x + 1, t) == t*y + assert ((-x - 1)*y).subs(x + 1, t) == -t*y + assert ((x - 1)*y).subs(x + 1, t) == y*(t - 2) + assert ((-x + 1)*y).subs(x + 1, t) == y*(-t + 2) + + # this should work every time: + e = a**2 - b - c + assert e.subs(Add(*e.args[:2]), d) == d + e.args[2] + assert e.subs(a**2 - c, d) == d - b + + # the fallback should recognize when a change has + # been made; while .1 == Rational(1, 10) they are not the same + # and the change should be made + assert (0.1 + a).subs(0.1, Rational(1, 10)) == Rational(1, 10) + a + + e = (-x*(-y + 1) - y*(y - 1)) + ans = (-x*(x) - y*(-x)).expand() + assert e.subs(-y + 1, x) == ans + + #Test issue 18747 + assert (exp(x) + cos(x)).subs(x, oo) == oo + assert Add(*[AccumBounds(-1, 1), oo]) == oo + assert Add(*[oo, AccumBounds(-1, 1)]) == oo + + +def test_subs_issue_4009(): + assert (I*Symbol('a')).subs(1, 2) == I*Symbol('a') + + +def test_functions_subs(): + f, g = symbols('f g', cls=Function) + l = Lambda((x, y), sin(x) + y) + assert (g(y, x) + cos(x)).subs(g, l) == sin(y) + x + cos(x) + assert (f(x)**2).subs(f, sin) == sin(x)**2 + assert (f(x, y)).subs(f, log) == log(x, y) + assert (f(x, y)).subs(f, sin) == f(x, y) + assert (sin(x) + atan2(x, y)).subs([[atan2, f], [sin, g]]) == \ + f(x, y) + g(x) + assert (g(f(x + y, x))).subs([[f, l], [g, exp]]) == exp(x + sin(x + y)) + + +def test_derivative_subs(): + f = Function('f') + g = Function('g') + assert Derivative(f(x), x).subs(f(x), y) != 0 + # need xreplace to put the function back, see #13803 + assert Derivative(f(x), x).subs(f(x), y).xreplace({y: f(x)}) == \ + Derivative(f(x), x) + # issues 5085, 5037 + assert cse(Derivative(f(x), x) + f(x))[1][0].has(Derivative) + assert cse(Derivative(f(x, y), x) + + Derivative(f(x, y), y))[1][0].has(Derivative) + eq = Derivative(g(x), g(x)) + assert eq.subs(g, f) == Derivative(f(x), f(x)) + assert eq.subs(g(x), f(x)) == Derivative(f(x), f(x)) + assert eq.subs(g, cos) == Subs(Derivative(y, y), y, cos(x)) + + +def test_derivative_subs2(): + f_func, g_func = symbols('f g', cls=Function) + f, g = f_func(x, y, z), g_func(x, y, z) + assert Derivative(f, x, y).subs(Derivative(f, x, y), g) == g + assert Derivative(f, y, x).subs(Derivative(f, x, y), g) == g + assert Derivative(f, x, y).subs(Derivative(f, x), g) == Derivative(g, y) + assert Derivative(f, x, y).subs(Derivative(f, y), g) == Derivative(g, x) + assert (Derivative(f, x, y, z).subs( + Derivative(f, x, z), g) == Derivative(g, y)) + assert (Derivative(f, x, y, z).subs( + Derivative(f, z, y), g) == Derivative(g, x)) + assert (Derivative(f, x, y, z).subs( + Derivative(f, z, y, x), g) == g) + + # Issue 9135 + assert (Derivative(f, x, x, y).subs( + Derivative(f, y, y), g) == Derivative(f, x, x, y)) + assert (Derivative(f, x, y, y, z).subs( + Derivative(f, x, y, y, y), g) == Derivative(f, x, y, y, z)) + + assert Derivative(f, x, y).subs(Derivative(f_func(x), x, y), g) == Derivative(f, x, y) + + +def test_derivative_subs3(): + dex = Derivative(exp(x), x) + assert Derivative(dex, x).subs(dex, exp(x)) == dex + assert dex.subs(exp(x), dex) == Derivative(exp(x), x, x) + + +def test_issue_5284(): + A, B = symbols('A B', commutative=False) + assert (x*A).subs(x**2*A, B) == x*A + assert (A**2).subs(A**3, B) == A**2 + assert (A**6).subs(A**3, B) == B**2 + + +def test_subs_iter(): + assert x.subs(reversed([[x, y]])) == y + it = iter([[x, y]]) + assert x.subs(it) == y + assert x.subs(Tuple((x, y))) == y + + +def test_subs_dict(): + a, b, c, d, e = symbols('a b c d e') + + assert (2*x + y + z).subs({"x": 1, "y": 2}) == 4 + z + + l = [(sin(x), 2), (x, 1)] + assert (sin(x)).subs(l) == \ + (sin(x)).subs(dict(l)) == 2 + assert sin(x).subs(reversed(l)) == sin(1) + + expr = sin(2*x) + sqrt(sin(2*x))*cos(2*x)*sin(exp(x)*x) + reps = {sin(2*x): c, + sqrt(sin(2*x)): a, + cos(2*x): b, + exp(x): e, + x: d,} + assert expr.subs(reps) == c + a*b*sin(d*e) + + l = [(x, 3), (y, x**2)] + assert (x + y).subs(l) == 3 + x**2 + assert (x + y).subs(reversed(l)) == 12 + + # If changes are made to convert lists into dictionaries and do + # a dictionary-lookup replacement, these tests will help to catch + # some logical errors that might occur + l = [(y, z + 2), (1 + z, 5), (z, 2)] + assert (y - 1 + 3*x).subs(l) == 5 + 3*x + l = [(y, z + 2), (z, 3)] + assert (y - 2).subs(l) == 3 + + +def test_no_arith_subs_on_floats(): + assert (x + 3).subs(x + 3, a) == a + assert (x + 3).subs(x + 2, a) == a + 1 + + assert (x + y + 3).subs(x + 3, a) == a + y + assert (x + y + 3).subs(x + 2, a) == a + y + 1 + + assert (x + 3.0).subs(x + 3.0, a) == a + assert (x + 3.0).subs(x + 2.0, a) == x + 3.0 + + assert (x + y + 3.0).subs(x + 3.0, a) == a + y + assert (x + y + 3.0).subs(x + 2.0, a) == x + y + 3.0 + + +def test_issue_5651(): + a, b, c, K = symbols('a b c K', commutative=True) + assert (a/(b*c)).subs(b*c, K) == a/K + assert (a/(b**2*c**3)).subs(b*c, K) == a/(c*K**2) + assert (1/(x*y)).subs(x*y, 2) == S.Half + assert ((1 + x*y)/(x*y)).subs(x*y, 1) == 2 + assert (x*y*z).subs(x*y, 2) == 2*z + assert ((1 + x*y)/(x*y)/z).subs(x*y, 1) == 2/z + + +def test_issue_6075(): + assert Tuple(1, True).subs(1, 2) == Tuple(2, True) + + +def test_issue_6079(): + # since x + 2.0 == x + 2 we can't do a simple equality test + assert _aresame((x + 2.0).subs(2, 3), x + 2.0) + assert _aresame((x + 2.0).subs(2.0, 3), x + 3) + assert not _aresame(x + 2, x + 2.0) + assert not _aresame(Basic(cos(x), S(1)), Basic(cos(x), S(1.))) + assert _aresame(cos, cos) + assert not _aresame(1, S.One) + assert not _aresame(x, symbols('x', positive=True)) + + +def test_issue_4680(): + N = Symbol('N') + assert N.subs({"N": 3}) == 3 + + +def test_issue_6158(): + assert (x - 1).subs(1, y) == x - y + assert (x - 1).subs(-1, y) == x + y + assert (x - oo).subs(oo, y) == x - y + assert (x - oo).subs(-oo, y) == x + y + + +def test_Function_subs(): + f, g, h, i = symbols('f g h i', cls=Function) + p = Piecewise((g(f(x, y)), x < -1), (g(x), x <= 1)) + assert p.subs(g, h) == Piecewise((h(f(x, y)), x < -1), (h(x), x <= 1)) + assert (f(y) + g(x)).subs({f: h, g: i}) == i(x) + h(y) + + +def test_simultaneous_subs(): + reps = {x: 0, y: 0} + assert (x/y).subs(reps) != (y/x).subs(reps) + assert (x/y).subs(reps, simultaneous=True) == \ + (y/x).subs(reps, simultaneous=True) + reps = reps.items() + assert (x/y).subs(reps) != (y/x).subs(reps) + assert (x/y).subs(reps, simultaneous=True) == \ + (y/x).subs(reps, simultaneous=True) + assert Derivative(x, y, z).subs(reps, simultaneous=True) == \ + Subs(Derivative(0, y, z), y, 0) + + +def test_issue_6419_6421(): + assert (1/(1 + x/y)).subs(x/y, x) == 1/(1 + x) + assert (-2*I).subs(2*I, x) == -x + assert (-I*x).subs(I*x, x) == -x + assert (-3*I*y**4).subs(3*I*y**2, x) == -x*y**2 + + +def test_issue_6559(): + assert (-12*x + y).subs(-x, 1) == 12 + y + # though this involves cse it generated a failure in Mul._eval_subs + x0, x1 = symbols('x0 x1') + e = -log(-12*sqrt(2) + 17)/24 - log(-2*sqrt(2) + 3)/12 + sqrt(2)/3 + # XXX modify cse so x1 is eliminated and x0 = -sqrt(2)? + assert cse(e) == ( + [(x0, sqrt(2))], [x0/3 - log(-12*x0 + 17)/24 - log(-2*x0 + 3)/12]) + + +def test_issue_5261(): + x = symbols('x', real=True) + e = I*x + assert exp(e).subs(exp(x), y) == y**I + assert (2**e).subs(2**x, y) == y**I + eq = (-2)**e + assert eq.subs((-2)**x, y) == eq + + +def test_issue_6923(): + assert (-2*x*sqrt(2)).subs(2*x, y) == -sqrt(2)*y + + +def test_2arg_hack(): + N = Symbol('N', commutative=False) + ans = Mul(2, y + 1, evaluate=False) + assert (2*x*(y + 1)).subs(x, 1, hack2=True) == ans + assert (2*(y + 1 + N)).subs(N, 0, hack2=True) == ans + + +@XFAIL +def test_mul2(): + """When this fails, remove things labelled "2-arg hack" + 1) remove special handling in the fallback of subs that + was added in the same commit as this test + 2) remove the special handling in Mul.flatten + """ + assert (2*(x + 1)).is_Mul + + +def test_noncommutative_subs(): + x,y = symbols('x,y', commutative=False) + assert (x*y*x).subs([(x, x*y), (y, x)], simultaneous=True) == (x*y*x**2*y) + + +def test_issue_2877(): + f = Float(2.0) + assert (x + f).subs({f: 2}) == x + 2 + + def r(a, b, c): + return factor(a*x**2 + b*x + c) + e = r(5.0/6, 10, 5) + assert nsimplify(e) == 5*x**2/6 + 10*x + 5 + + +def test_issue_5910(): + t = Symbol('t') + assert (1/(1 - t)).subs(t, 1) is zoo + n = t + d = t - 1 + assert (n/d).subs(t, 1) is zoo + assert (-n/-d).subs(t, 1) is zoo + + +def test_issue_5217(): + s = Symbol('s') + z = (1 - 2*x*x) + w = (1 + 2*x*x) + q = 2*x*x*2*y*y + sub = {2*x*x: s} + assert w.subs(sub) == 1 + s + assert z.subs(sub) == 1 - s + assert q == 4*x**2*y**2 + assert q.subs(sub) == 2*y**2*s + + +def test_issue_10829(): + assert (4**x).subs(2**x, y) == y**2 + assert (9**x).subs(3**x, y) == y**2 + + +def test_pow_eval_subs_no_cache(): + # Tests pull request 9376 is working + from sympy.core.cache import clear_cache + + s = 1/sqrt(x**2) + # This bug only appeared when the cache was turned off. + # We need to approximate running this test without the cache. + # This creates approximately the same situation. + clear_cache() + + # This used to fail with a wrong result. + # It incorrectly returned 1/sqrt(x**2) before this pull request. + result = s.subs(sqrt(x**2), y) + assert result == 1/y + + +def test_RootOf_issue_10092(): + x = Symbol('x', real=True) + eq = x**3 - 17*x**2 + 81*x - 118 + r = RootOf(eq, 0) + assert (x < r).subs(x, r) is S.false + + +def test_issue_8886(): + from sympy.physics.mechanics import ReferenceFrame as R + # if something can't be sympified we assume that it + # doesn't play well with SymPy and disallow the + # substitution + v = R('A').x + raises(SympifyError, lambda: x.subs(x, v)) + raises(SympifyError, lambda: v.subs(v, x)) + assert v.__eq__(x) is False + + +def test_issue_12657(): + # treat -oo like the atom that it is + reps = [(-oo, 1), (oo, 2)] + assert (x < -oo).subs(reps) == (x < 1) + assert (x < -oo).subs(list(reversed(reps))) == (x < 1) + reps = [(-oo, 2), (oo, 1)] + assert (x < oo).subs(reps) == (x < 1) + assert (x < oo).subs(list(reversed(reps))) == (x < 1) + + +def test_recurse_Application_args(): + F = Lambda((x, y), exp(2*x + 3*y)) + f = Function('f') + A = f(x, f(x, x)) + C = F(x, F(x, x)) + assert A.subs(f, F) == A.replace(f, F) == C + + +def test_Subs_subs(): + assert Subs(x*y, x, x).subs(x, y) == Subs(x*y, x, y) + assert Subs(x*y, x, x + 1).subs(x, y) == \ + Subs(x*y, x, y + 1) + assert Subs(x*y, y, x + 1).subs(x, y) == \ + Subs(y**2, y, y + 1) + a = Subs(x*y*z, (y, x, z), (x + 1, x + z, x)) + b = Subs(x*y*z, (y, x, z), (x + 1, y + z, y)) + assert a.subs(x, y) == b and \ + a.doit().subs(x, y) == a.subs(x, y).doit() + f = Function('f') + g = Function('g') + assert Subs(2*f(x, y) + g(x), f(x, y), 1).subs(y, 2) == Subs( + 2*f(x, y) + g(x), (f(x, y), y), (1, 2)) + + +def test_issue_13333(): + eq = 1/x + assert eq.subs({"x": '1/2'}) == 2 + assert eq.subs({"x": '(1/2)'}) == 2 + + +def test_issue_15234(): + x, y = symbols('x y', real=True) + p = 6*x**5 + x**4 - 4*x**3 + 4*x**2 - 2*x + 3 + p_subbed = 6*x**5 - 4*x**3 - 2*x + y**4 + 4*y**2 + 3 + assert p.subs([(x**i, y**i) for i in [2, 4]]) == p_subbed + x, y = symbols('x y', complex=True) + p = 6*x**5 + x**4 - 4*x**3 + 4*x**2 - 2*x + 3 + p_subbed = 6*x**5 - 4*x**3 - 2*x + y**4 + 4*y**2 + 3 + assert p.subs([(x**i, y**i) for i in [2, 4]]) == p_subbed + + +def test_issue_6976(): + x, y = symbols('x y') + assert (sqrt(x)**3 + sqrt(x) + x + x**2).subs(sqrt(x), y) == \ + y**4 + y**3 + y**2 + y + assert (x**4 + x**3 + x**2 + x + sqrt(x)).subs(x**2, y) == \ + sqrt(x) + x**3 + x + y**2 + y + assert x.subs(x**3, y) == x + assert x.subs(x**Rational(1, 3), y) == y**3 + + # More substitutions are possible with nonnegative symbols + x, y = symbols('x y', nonnegative=True) + assert (x**4 + x**3 + x**2 + x + sqrt(x)).subs(x**2, y) == \ + y**Rational(1, 4) + y**Rational(3, 2) + sqrt(y) + y**2 + y + assert x.subs(x**3, y) == y**Rational(1, 3) + + +def test_issue_11746(): + assert (1/x).subs(x**2, 1) == 1/x + assert (1/(x**3)).subs(x**2, 1) == x**(-3) + assert (1/(x**4)).subs(x**2, 1) == 1 + assert (1/(x**3)).subs(x**4, 1) == x**(-3) + assert (1/(y**5)).subs(x**5, 1) == y**(-5) + + +def test_issue_17823(): + from sympy.physics.mechanics import dynamicsymbols + q1, q2 = dynamicsymbols('q1, q2') + expr = q1.diff().diff()**2*q1 + q1.diff()*q2.diff() + reps={q1: a, q1.diff(): a*x*y, q1.diff().diff(): z} + assert expr.subs(reps) == a*x*y*Derivative(q2, t) + a*z**2 + + +def test_issue_19326(): + x, y = [i(t) for i in map(Function, 'xy')] + assert (x*y).subs({x: 1 + x, y: x}) == (1 + x)*x + + +def test_issue_19558(): + e = (7*x*cos(x) - 12*log(x)**3)*(-log(x)**4 + 2*sin(x) + 1)**2/ \ + (2*(x*cos(x) - 2*log(x)**3)*(3*log(x)**4 - 7*sin(x) + 3)**2) + + assert e.subs(x, oo) == AccumBounds(-oo, oo) + assert (sin(x) + cos(x)).subs(x, oo) == AccumBounds(-2, 2) + + +def test_issue_22033(): + xr = Symbol('xr', real=True) + e = (1/xr) + assert e.subs(xr**2, y) == e + + +def test_guard_against_indeterminate_evaluation(): + eq = x**y + assert eq.subs([(x, 1), (y, oo)]) == 1 # because 1**y == 1 + assert eq.subs([(y, oo), (x, 1)]) is S.NaN + assert eq.subs({x: 1, y: oo}) is S.NaN + assert eq.subs([(x, 1), (y, oo)], simultaneous=True) is S.NaN diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py new file mode 100644 index 0000000000000000000000000000000000000000..acf27700825c4822456207afe95108480505ce2c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py @@ -0,0 +1,421 @@ +import threading + +from sympy.core.function import Function, UndefinedFunction +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import (GreaterThan, LessThan, StrictGreaterThan, StrictLessThan) +from sympy.core.symbol import (Dummy, Symbol, Wild, symbols) +from sympy.core.sympify import sympify # can't import as S yet +from sympy.core.symbol import uniquely_named_symbol, _symbol, Str + +from sympy.testing.pytest import raises, skip_under_pyodide +from sympy.core.symbol import disambiguate + + +def test_Str(): + a1 = Str('a') + a2 = Str('a') + b = Str('b') + assert a1 == a2 != b + raises(TypeError, lambda: Str()) + + +def test_Symbol(): + a = Symbol("a") + x1 = Symbol("x") + x2 = Symbol("x") + xdummy1 = Dummy("x") + xdummy2 = Dummy("x") + + assert a != x1 + assert a != x2 + assert x1 == x2 + assert x1 != xdummy1 + assert xdummy1 != xdummy2 + + assert Symbol("x") == Symbol("x") + assert Dummy("x") != Dummy("x") + d = symbols('d', cls=Dummy) + assert isinstance(d, Dummy) + c, d = symbols('c,d', cls=Dummy) + assert isinstance(c, Dummy) + assert isinstance(d, Dummy) + raises(TypeError, lambda: Symbol()) + + +def test_Dummy(): + assert Dummy() != Dummy() + + +def test_Dummy_force_dummy_index(): + raises(AssertionError, lambda: Dummy(dummy_index=1)) + assert Dummy('d', dummy_index=2) == Dummy('d', dummy_index=2) + assert Dummy('d1', dummy_index=2) != Dummy('d2', dummy_index=2) + d1 = Dummy('d', dummy_index=3) + d2 = Dummy('d') + # might fail if d1 were created with dummy_index >= 10**6 + assert d1 != d2 + d3 = Dummy('d', dummy_index=3) + assert d1 == d3 + assert Dummy()._count == Dummy('d', dummy_index=3)._count + + +def test_lt_gt(): + S = sympify + x, y = Symbol('x'), Symbol('y') + + assert (x >= y) == GreaterThan(x, y) + assert (x >= 0) == GreaterThan(x, 0) + assert (x <= y) == LessThan(x, y) + assert (x <= 0) == LessThan(x, 0) + + assert (0 <= x) == GreaterThan(x, 0) + assert (0 >= x) == LessThan(x, 0) + assert (S(0) >= x) == GreaterThan(0, x) + assert (S(0) <= x) == LessThan(0, x) + + assert (x > y) == StrictGreaterThan(x, y) + assert (x > 0) == StrictGreaterThan(x, 0) + assert (x < y) == StrictLessThan(x, y) + assert (x < 0) == StrictLessThan(x, 0) + + assert (0 < x) == StrictGreaterThan(x, 0) + assert (0 > x) == StrictLessThan(x, 0) + assert (S(0) > x) == StrictGreaterThan(0, x) + assert (S(0) < x) == StrictLessThan(0, x) + + e = x**2 + 4*x + 1 + assert (e >= 0) == GreaterThan(e, 0) + assert (0 <= e) == GreaterThan(e, 0) + assert (e > 0) == StrictGreaterThan(e, 0) + assert (0 < e) == StrictGreaterThan(e, 0) + + assert (e <= 0) == LessThan(e, 0) + assert (0 >= e) == LessThan(e, 0) + assert (e < 0) == StrictLessThan(e, 0) + assert (0 > e) == StrictLessThan(e, 0) + + assert (S(0) >= e) == GreaterThan(0, e) + assert (S(0) <= e) == LessThan(0, e) + assert (S(0) < e) == StrictLessThan(0, e) + assert (S(0) > e) == StrictGreaterThan(0, e) + + +def test_no_len(): + # there should be no len for numbers + x = Symbol('x') + raises(TypeError, lambda: len(x)) + + +def test_ineq_unequal(): + S = sympify + x, y, z = symbols('x,y,z') + + e = ( + S(-1) >= x, S(-1) >= y, S(-1) >= z, + S(-1) > x, S(-1) > y, S(-1) > z, + S(-1) <= x, S(-1) <= y, S(-1) <= z, + S(-1) < x, S(-1) < y, S(-1) < z, + S(0) >= x, S(0) >= y, S(0) >= z, + S(0) > x, S(0) > y, S(0) > z, + S(0) <= x, S(0) <= y, S(0) <= z, + S(0) < x, S(0) < y, S(0) < z, + S('3/7') >= x, S('3/7') >= y, S('3/7') >= z, + S('3/7') > x, S('3/7') > y, S('3/7') > z, + S('3/7') <= x, S('3/7') <= y, S('3/7') <= z, + S('3/7') < x, S('3/7') < y, S('3/7') < z, + S(1.5) >= x, S(1.5) >= y, S(1.5) >= z, + S(1.5) > x, S(1.5) > y, S(1.5) > z, + S(1.5) <= x, S(1.5) <= y, S(1.5) <= z, + S(1.5) < x, S(1.5) < y, S(1.5) < z, + S(2) >= x, S(2) >= y, S(2) >= z, + S(2) > x, S(2) > y, S(2) > z, + S(2) <= x, S(2) <= y, S(2) <= z, + S(2) < x, S(2) < y, S(2) < z, + x >= -1, y >= -1, z >= -1, + x > -1, y > -1, z > -1, + x <= -1, y <= -1, z <= -1, + x < -1, y < -1, z < -1, + x >= 0, y >= 0, z >= 0, + x > 0, y > 0, z > 0, + x <= 0, y <= 0, z <= 0, + x < 0, y < 0, z < 0, + x >= 1.5, y >= 1.5, z >= 1.5, + x > 1.5, y > 1.5, z > 1.5, + x <= 1.5, y <= 1.5, z <= 1.5, + x < 1.5, y < 1.5, z < 1.5, + x >= 2, y >= 2, z >= 2, + x > 2, y > 2, z > 2, + x <= 2, y <= 2, z <= 2, + x < 2, y < 2, z < 2, + + x >= y, x >= z, y >= x, y >= z, z >= x, z >= y, + x > y, x > z, y > x, y > z, z > x, z > y, + x <= y, x <= z, y <= x, y <= z, z <= x, z <= y, + x < y, x < z, y < x, y < z, z < x, z < y, + + x - pi >= y + z, y - pi >= x + z, z - pi >= x + y, + x - pi > y + z, y - pi > x + z, z - pi > x + y, + x - pi <= y + z, y - pi <= x + z, z - pi <= x + y, + x - pi < y + z, y - pi < x + z, z - pi < x + y, + True, False + ) + + left_e = e[:-1] + for i, e1 in enumerate( left_e ): + for e2 in e[i + 1:]: + assert e1 != e2 + + +def test_Wild_properties(): + S = sympify + # these tests only include Atoms + x = Symbol("x") + y = Symbol("y") + p = Symbol("p", positive=True) + k = Symbol("k", integer=True) + n = Symbol("n", integer=True, positive=True) + + given_patterns = [ x, y, p, k, -k, n, -n, S(-3), S(3), + pi, Rational(3, 2), I ] + + integerp = lambda k: k.is_integer + positivep = lambda k: k.is_positive + symbolp = lambda k: k.is_Symbol + realp = lambda k: k.is_extended_real + + S = Wild("S", properties=[symbolp]) + R = Wild("R", properties=[realp]) + Y = Wild("Y", exclude=[x, p, k, n]) + P = Wild("P", properties=[positivep]) + K = Wild("K", properties=[integerp]) + N = Wild("N", properties=[positivep, integerp]) + + given_wildcards = [ S, R, Y, P, K, N ] + + goodmatch = { + S: (x, y, p, k, n), + R: (p, k, -k, n, -n, -3, 3, pi, Rational(3, 2)), + Y: (y, -3, 3, pi, Rational(3, 2), I ), + P: (p, n, 3, pi, Rational(3, 2)), + K: (k, -k, n, -n, -3, 3), + N: (n, 3)} + + for A in given_wildcards: + for pat in given_patterns: + d = pat.match(A) + if pat in goodmatch[A]: + assert d[A] in goodmatch[A] + else: + assert d is None + + +def test_symbols(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + + assert symbols('x') == x + assert symbols('x ') == x + assert symbols(' x ') == x + assert symbols('x,') == (x,) + assert symbols('x, ') == (x,) + assert symbols('x ,') == (x,) + + assert symbols('x , y') == (x, y) + + assert symbols('x,y,z') == (x, y, z) + assert symbols('x y z') == (x, y, z) + + assert symbols('x,y,z,') == (x, y, z) + assert symbols('x y z ') == (x, y, z) + + xyz = Symbol('xyz') + abc = Symbol('abc') + + assert symbols('xyz') == xyz + assert symbols('xyz,') == (xyz,) + assert symbols('xyz,abc') == (xyz, abc) + + assert symbols(('xyz',)) == (xyz,) + assert symbols(('xyz,',)) == ((xyz,),) + assert symbols(('x,y,z,',)) == ((x, y, z),) + assert symbols(('xyz', 'abc')) == (xyz, abc) + assert symbols(('xyz,abc',)) == ((xyz, abc),) + assert symbols(('xyz,abc', 'x,y,z')) == ((xyz, abc), (x, y, z)) + + assert symbols(('x', 'y', 'z')) == (x, y, z) + assert symbols(['x', 'y', 'z']) == [x, y, z] + assert symbols({'x', 'y', 'z'}) == {x, y, z} + + raises(ValueError, lambda: symbols('')) + raises(ValueError, lambda: symbols(',')) + raises(ValueError, lambda: symbols('x,,y,,z')) + raises(ValueError, lambda: symbols(('x', '', 'y', '', 'z'))) + + a, b = symbols('x,y', real=True) + assert a.is_real and b.is_real + + x0 = Symbol('x0') + x1 = Symbol('x1') + x2 = Symbol('x2') + + y0 = Symbol('y0') + y1 = Symbol('y1') + + assert symbols('x0:0') == () + assert symbols('x0:1') == (x0,) + assert symbols('x0:2') == (x0, x1) + assert symbols('x0:3') == (x0, x1, x2) + + assert symbols('x:0') == () + assert symbols('x:1') == (x0,) + assert symbols('x:2') == (x0, x1) + assert symbols('x:3') == (x0, x1, x2) + + assert symbols('x1:1') == () + assert symbols('x1:2') == (x1,) + assert symbols('x1:3') == (x1, x2) + + assert symbols('x1:3,x,y,z') == (x1, x2, x, y, z) + + assert symbols('x:3,y:2') == (x0, x1, x2, y0, y1) + assert symbols(('x:3', 'y:2')) == ((x0, x1, x2), (y0, y1)) + + a = Symbol('a') + b = Symbol('b') + c = Symbol('c') + d = Symbol('d') + + assert symbols('x:z') == (x, y, z) + assert symbols('a:d,x:z') == (a, b, c, d, x, y, z) + assert symbols(('a:d', 'x:z')) == ((a, b, c, d), (x, y, z)) + + aa = Symbol('aa') + ab = Symbol('ab') + ac = Symbol('ac') + ad = Symbol('ad') + + assert symbols('aa:d') == (aa, ab, ac, ad) + assert symbols('aa:d,x:z') == (aa, ab, ac, ad, x, y, z) + assert symbols(('aa:d','x:z')) == ((aa, ab, ac, ad), (x, y, z)) + + assert type(symbols(('q:2', 'u:2'), cls=Function)[0][0]) == UndefinedFunction # issue 23532 + + # issue 6675 + def sym(s): + return str(symbols(s)) + assert sym('a0:4') == '(a0, a1, a2, a3)' + assert sym('a2:4,b1:3') == '(a2, a3, b1, b2)' + assert sym('a1(2:4)') == '(a12, a13)' + assert sym('a0:2.0:2') == '(a0.0, a0.1, a1.0, a1.1)' + assert sym('aa:cz') == '(aaz, abz, acz)' + assert sym('aa:c0:2') == '(aa0, aa1, ab0, ab1, ac0, ac1)' + assert sym('aa:ba:b') == '(aaa, aab, aba, abb)' + assert sym('a:3b') == '(a0b, a1b, a2b)' + assert sym('a-1:3b') == '(a-1b, a-2b)' + assert sym(r'a:2\,:2' + chr(0)) == '(a0,0%s, a0,1%s, a1,0%s, a1,1%s)' % ( + (chr(0),)*4) + assert sym('x(:a:3)') == '(x(a0), x(a1), x(a2))' + assert sym('x(:c):1') == '(xa0, xb0, xc0)' + assert sym('x((:a)):3') == '(x(a)0, x(a)1, x(a)2)' + assert sym('x(:a:3') == '(x(a0, x(a1, x(a2)' + assert sym(':2') == '(0, 1)' + assert sym(':b') == '(a, b)' + assert sym(':b:2') == '(a0, a1, b0, b1)' + assert sym(':2:2') == '(00, 01, 10, 11)' + assert sym(':b:b') == '(aa, ab, ba, bb)' + + raises(ValueError, lambda: symbols(':')) + raises(ValueError, lambda: symbols('a:')) + raises(ValueError, lambda: symbols('::')) + raises(ValueError, lambda: symbols('a::')) + raises(ValueError, lambda: symbols(':a:')) + raises(ValueError, lambda: symbols('::a')) + + +def test_symbols_become_functions_issue_3539(): + from sympy.abc import alpha, phi, beta, t + raises(TypeError, lambda: beta(2)) + raises(TypeError, lambda: beta(2.5)) + raises(TypeError, lambda: phi(2.5)) + raises(TypeError, lambda: alpha(2.5)) + raises(TypeError, lambda: phi(t)) + + +def test_unicode(): + xu = Symbol('x') + x = Symbol('x') + assert x == xu + + raises(TypeError, lambda: Symbol(1)) + + +def test_uniquely_named_symbol_and_Symbol(): + F = uniquely_named_symbol + x = Symbol('x') + assert F(x) == x + assert F('x') == x + assert str(F('x', x)) == 'x0' + assert str(F('x', (x + 1, 1/x))) == 'x0' + _x = Symbol('x', real=True) + assert F(('x', _x)) == _x + assert F((x, _x)) == _x + assert F('x', real=True).is_real + y = Symbol('y') + assert F(('x', y), real=True).is_real + r = Symbol('x', real=True) + assert F(('x', r)).is_real + assert F(('x', r), real=False).is_real + assert F('x1', Symbol('x1'), + compare=lambda i: str(i).rstrip('1')).name == 'x0' + assert F('x1', Symbol('x1'), + modify=lambda i: i + '_').name == 'x1_' + assert _symbol(x, _x) == x + + +def test_disambiguate(): + x, y, y_1, _x, x_1, x_2 = symbols('x y y_1 _x x_1 x_2') + t1 = Dummy('y'), _x, Dummy('x'), Dummy('x') + t2 = Dummy('x'), Dummy('x') + t3 = Dummy('x'), Dummy('y') + t4 = x, Dummy('x') + t5 = Symbol('x', integer=True), x, Symbol('x_1') + + assert disambiguate(*t1) == (y, x_2, x, x_1) + assert disambiguate(*t2) == (x, x_1) + assert disambiguate(*t3) == (x, y) + assert disambiguate(*t4) == (x_1, x) + assert disambiguate(*t5) == (t5[0], x_2, x_1) + assert disambiguate(*t5)[0] != x # assumptions are retained + + t6 = _x, Dummy('x')/y + t7 = y*Dummy('y'), y + + assert disambiguate(*t6) == (x_1, x/y) + assert disambiguate(*t7) == (y*y_1, y_1) + assert disambiguate(Dummy('x_1'), Dummy('x_1') + ) == (x_1, Symbol('x_1_1')) + + +@skip_under_pyodide("Cannot create threads under pyodide.") +def test_issue_gh_16734(): + # https://github.com/sympy/sympy/issues/16734 + + syms = list(symbols('x, y')) + + def thread1(): + for n in range(1000): + syms[0], syms[1] = symbols(f'x{n}, y{n}') + syms[0].is_positive # Check an assumption in this thread. + syms[0] = None + + def thread2(): + while syms[0] is not None: + # Compare the symbol in this thread. + result = (syms[0] == syms[1]) # noqa + + # Previously this would be very likely to raise an exception: + thread = threading.Thread(target=thread1) + thread.start() + thread2() + thread.join() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..40be30c25d5826ceadde6d176c160a0090967659 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py @@ -0,0 +1,892 @@ +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.function import (Function, Lambda) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, pi, oo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.logic.boolalg import (false, Or, true, Xor) +from sympy.matrices.dense import Matrix +from sympy.parsing.sympy_parser import null +from sympy.polys.polytools import Poly +from sympy.printing.repr import srepr +from sympy.sets.fancysets import Range +from sympy.sets.sets import Interval +from sympy.abc import x, y +from sympy.core.sympify import (sympify, _sympify, SympifyError, kernS, + CantSympify, converter) +from sympy.core.decorators import _sympifyit +from sympy.external import import_module +from sympy.testing.pytest import raises, XFAIL, skip +from sympy.utilities.decorator import conserve_mpmath_dps +from sympy.geometry import Point, Line +from sympy.functions.combinatorial.factorials import factorial, factorial2 +from sympy.abc import _clash, _clash1, _clash2 +from sympy.external.gmpy import gmpy as _gmpy, flint as _flint +from sympy.sets import FiniteSet, EmptySet +from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray + +import mpmath +from collections import defaultdict, OrderedDict + + +numpy = import_module('numpy') + + +def test_issue_3538(): + v = sympify("exp(x)") + assert v == exp(x) + assert type(v) == type(exp(x)) + assert str(type(v)) == str(type(exp(x))) + + +def test_sympify1(): + assert sympify("x") == Symbol("x") + assert sympify(" x") == Symbol("x") + assert sympify(" x ") == Symbol("x") + # issue 4877 + assert sympify('--.5') == 0.5 + assert sympify('-1/2') == -S.Half + assert sympify('-+--.5') == -0.5 + assert sympify('-.[3]') == Rational(-1, 3) + assert sympify('.[3]') == Rational(1, 3) + assert sympify('+.[3]') == Rational(1, 3) + assert sympify('+0.[3]*10**-2') == Rational(1, 300) + assert sympify('.[052631578947368421]') == Rational(1, 19) + assert sympify('.0[526315789473684210]') == Rational(1, 19) + assert sympify('.034[56]') == Rational(1711, 49500) + # options to make reals into rationals + assert sympify('1.22[345]', rational=True) == \ + 1 + Rational(22, 100) + Rational(345, 99900) + assert sympify('2/2.6', rational=True) == Rational(10, 13) + assert sympify('2.6/2', rational=True) == Rational(13, 10) + assert sympify('2.6e2/17', rational=True) == Rational(260, 17) + assert sympify('2.6e+2/17', rational=True) == Rational(260, 17) + assert sympify('2.6e-2/17', rational=True) == Rational(26, 17000) + assert sympify('2.1+3/4', rational=True) == \ + Rational(21, 10) + Rational(3, 4) + assert sympify('2.234456', rational=True) == Rational(279307, 125000) + assert sympify('2.234456e23', rational=True) == 223445600000000000000000 + assert sympify('2.234456e-23', rational=True) == \ + Rational(279307, 12500000000000000000000000000) + assert sympify('-2.234456e-23', rational=True) == \ + Rational(-279307, 12500000000000000000000000000) + assert sympify('12345678901/17', rational=True) == \ + Rational(12345678901, 17) + assert sympify('1/.3 + x', rational=True) == Rational(10, 3) + x + # make sure longs in fractions work + assert sympify('222222222222/11111111111') == \ + Rational(222222222222, 11111111111) + # ... even if they come from repetend notation + assert sympify('1/.2[123456789012]') == Rational(333333333333, 70781892967) + # ... or from high precision reals + assert sympify('.1234567890123456', rational=True) == \ + Rational(19290123283179, 156250000000000) + + +def test_sympify_Fraction(): + try: + import fractions + except ImportError: + pass + else: + value = sympify(fractions.Fraction(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +def test_sympify_gmpy(): + if _gmpy is not None: + import gmpy2 + + value = sympify(gmpy2.mpz(1000001)) + assert value == Integer(1000001) and type(value) is Integer + + value = sympify(gmpy2.mpq(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +def test_sympify_flint(): + if _flint is not None: + import flint + + value = sympify(flint.fmpz(1000001)) + assert value == Integer(1000001) and type(value) is Integer + + value = sympify(flint.fmpq(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +@conserve_mpmath_dps +def test_sympify_mpmath(): + value = sympify(mpmath.mpf(1.0)) + assert value == Float(1.0) and type(value) is Float + + mpmath.mp.dps = 12 + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159265359"), Float("1e-12")) == True + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159265359"), Float("1e-13")) == False + + mpmath.mp.dps = 6 + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159"), Float("1e-5")) == True + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159"), Float("1e-6")) == False + + mpmath.mp.dps = 15 + assert sympify(mpmath.mpc(1.0 + 2.0j)) == Float(1.0) + Float(2.0)*I + + +def test_sympify2(): + class A: + def _sympy_(self): + return Symbol("x")**3 + + a = A() + + assert _sympify(a) == x**3 + assert sympify(a) == x**3 + assert a == x**3 + + +def test_sympify3(): + assert sympify("x**3") == x**3 + assert sympify("x^3") == x**3 + assert sympify("1/2") == Integer(1)/2 + + raises(SympifyError, lambda: _sympify('x**3')) + raises(SympifyError, lambda: _sympify('1/2')) + + +def test_sympify_keywords(): + raises(SympifyError, lambda: sympify('if')) + raises(SympifyError, lambda: sympify('for')) + raises(SympifyError, lambda: sympify('while')) + raises(SympifyError, lambda: sympify('lambda')) + + +def test_sympify_float(): + assert sympify("1e-64") != 0 + assert sympify("1e-20000") != 0 + + +def test_sympify_bool(): + assert sympify(True) is true + assert sympify(False) is false + + +def test_sympify_iterables(): + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify(['.3', '.2'], rational=True) == ans + assert sympify({"x": 0, "y": 1}) == {x: 0, y: 1} + assert sympify(['1', '2', ['3', '4']]) == [S(1), S(2), [S(3), S(4)]] + + +@XFAIL +def test_issue_16772(): + # because there is a converter for tuple, the + # args are only sympified without the flags being passed + # along; list, on the other hand, is not converted + # with a converter so its args are traversed later + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify(('.3', '.2'), rational=True) == Tuple(*ans) + + +def test_issue_16859(): + class no(float, CantSympify): + pass + raises(SympifyError, lambda: sympify(no(1.2))) + + +def test_sympify4(): + class A: + def _sympy_(self): + return Symbol("x") + + a = A() + + assert _sympify(a)**3 == x**3 + assert sympify(a)**3 == x**3 + assert a == x + + +def test_sympify_text(): + assert sympify('some') == Symbol('some') + assert sympify('core') == Symbol('core') + + assert sympify('True') is True + assert sympify('False') is False + + assert sympify('Poly') == Poly + assert sympify('sin') == sin + + +def test_sympify_function(): + assert sympify('factor(x**2-1, x)') == -(1 - x)*(x + 1) + assert sympify('sin(pi/2)*cos(pi)') == -Integer(1) + + +def test_sympify_poly(): + p = Poly(x**2 + x + 1, x) + + assert _sympify(p) is p + assert sympify(p) is p + + +def test_sympify_factorial(): + assert sympify('x!') == factorial(x) + assert sympify('(x+1)!') == factorial(x + 1) + assert sympify('(1 + y*(x + 1))!') == factorial(1 + y*(x + 1)) + assert sympify('(1 + y*(x + 1)!)^2') == (1 + y*factorial(x + 1))**2 + assert sympify('y*x!') == y*factorial(x) + assert sympify('x!!') == factorial2(x) + assert sympify('(x+1)!!') == factorial2(x + 1) + assert sympify('(1 + y*(x + 1))!!') == factorial2(1 + y*(x + 1)) + assert sympify('(1 + y*(x + 1)!!)^2') == (1 + y*factorial2(x + 1))**2 + assert sympify('y*x!!') == y*factorial2(x) + assert sympify('factorial2(x)!') == factorial(factorial2(x)) + + raises(SympifyError, lambda: sympify("+!!")) + raises(SympifyError, lambda: sympify(")!!")) + raises(SympifyError, lambda: sympify("!")) + raises(SympifyError, lambda: sympify("(!)")) + raises(SympifyError, lambda: sympify("x!!!")) + + +def test_issue_3595(): + assert sympify("a_") == Symbol("a_") + assert sympify("_a") == Symbol("_a") + + +def test_lambda(): + x = Symbol('x') + assert sympify('lambda: 1') == Lambda((), 1) + assert sympify('lambda x: x') == Lambda(x, x) + assert sympify('lambda x: 2*x') == Lambda(x, 2*x) + assert sympify('lambda x, y: 2*x+y') == Lambda((x, y), 2*x + y) + + +def test_lambda_raises(): + raises(SympifyError, lambda: sympify("lambda *args: args")) # args argument error + raises(SympifyError, lambda: sympify("lambda **kwargs: kwargs[0]")) # kwargs argument error + raises(SympifyError, lambda: sympify("lambda x = 1: x")) # Keyword argument error + with raises(SympifyError): + _sympify('lambda: 1') + + +def test_sympify_raises(): + raises(SympifyError, lambda: sympify("fx)")) + + class A: + def __str__(self): + return 'x' + + raises(SympifyError, lambda: sympify(A())) + + +def test__sympify(): + x = Symbol('x') + f = Function('f') + + # positive _sympify + assert _sympify(x) is x + assert _sympify(1) == Integer(1) + assert _sympify(0.5) == Float("0.5") + assert _sympify(1 + 1j) == 1.0 + I*1.0 + + # Function f is not Basic and can't sympify to Basic. We allow it to pass + # with sympify but not with _sympify. + # https://github.com/sympy/sympy/issues/20124 + assert sympify(f) is f + raises(SympifyError, lambda: _sympify(f)) + + class A: + def _sympy_(self): + return Integer(5) + + a = A() + assert _sympify(a) == Integer(5) + + # negative _sympify + raises(SympifyError, lambda: _sympify('1')) + raises(SympifyError, lambda: _sympify([1, 2, 3])) + + +def test_sympifyit(): + x = Symbol('x') + y = Symbol('y') + + @_sympifyit('b', NotImplemented) + def add(a, b): + return a + b + + assert add(x, 1) == x + 1 + assert add(x, 0.5) == x + Float('0.5') + assert add(x, y) == x + y + + assert add(x, '1') == NotImplemented + + @_sympifyit('b') + def add_raises(a, b): + return a + b + + assert add_raises(x, 1) == x + 1 + assert add_raises(x, 0.5) == x + Float('0.5') + assert add_raises(x, y) == x + y + + raises(SympifyError, lambda: add_raises(x, '1')) + + +def test_int_float(): + class F1_1: + def __float__(self): + return 1.1 + + class F1_1b: + """ + This class is still a float, even though it also implements __int__(). + """ + def __float__(self): + return 1.1 + + def __int__(self): + return 1 + + class F1_1c: + """ + This class is still a float, because it implements _sympy_() + """ + def __float__(self): + return 1.1 + + def __int__(self): + return 1 + + def _sympy_(self): + return Float(1.1) + + class I5: + def __int__(self): + return 5 + + class I5b: + """ + This class implements both __int__() and __float__(), so it will be + treated as Float in SymPy. One could change this behavior, by using + float(a) == int(a), but deciding that integer-valued floats represent + exact numbers is arbitrary and often not correct, so we do not do it. + If, in the future, we decide to do it anyway, the tests for I5b need to + be changed. + """ + def __float__(self): + return 5.0 + + def __int__(self): + return 5 + + class I5c: + """ + This class implements both __int__() and __float__(), but also + a _sympy_() method, so it will be Integer. + """ + def __float__(self): + return 5.0 + + def __int__(self): + return 5 + + def _sympy_(self): + return Integer(5) + + i5 = I5() + i5b = I5b() + i5c = I5c() + f1_1 = F1_1() + f1_1b = F1_1b() + f1_1c = F1_1c() + assert sympify(i5) == 5 + assert isinstance(sympify(i5), Integer) + assert sympify(i5b) == 5.0 + assert isinstance(sympify(i5b), Float) + assert sympify(i5c) == 5 + assert isinstance(sympify(i5c), Integer) + assert abs(sympify(f1_1) - 1.1) < 1e-5 + assert abs(sympify(f1_1b) - 1.1) < 1e-5 + assert abs(sympify(f1_1c) - 1.1) < 1e-5 + + assert _sympify(i5) == 5 + assert isinstance(_sympify(i5), Integer) + assert _sympify(i5b) == 5.0 + assert isinstance(_sympify(i5b), Float) + assert _sympify(i5c) == 5 + assert isinstance(_sympify(i5c), Integer) + assert abs(_sympify(f1_1) - 1.1) < 1e-5 + assert abs(_sympify(f1_1b) - 1.1) < 1e-5 + assert abs(_sympify(f1_1c) - 1.1) < 1e-5 + + +def test_evaluate_false(): + cases = { + '2 + 3': Add(2, 3, evaluate=False), + '2**2 / 3': Mul(Pow(2, 2, evaluate=False), Pow(3, -1, evaluate=False), evaluate=False), + '2 + 3 * 5': Add(2, Mul(3, 5, evaluate=False), evaluate=False), + '2 - 3 * 5': Add(2, Mul(-1, Mul(3, 5,evaluate=False), evaluate=False), evaluate=False), + '1 / 3': Mul(1, Pow(3, -1, evaluate=False), evaluate=False), + 'True | False': Or(True, False, evaluate=False), + '1 + 2 + 3 + 5*3 + integrate(x)': Add(1, 2, 3, Mul(5, 3, evaluate=False), x**2/2, evaluate=False), + '2 * 4 * 6 + 8': Add(Mul(2, 4, 6, evaluate=False), 8, evaluate=False), + '2 - 8 / 4': Add(2, Mul(-1, Mul(8, Pow(4, -1, evaluate=False), evaluate=False), evaluate=False), evaluate=False), + '2 - 2**2': Add(2, Mul(-1, Pow(2, 2, evaluate=False), evaluate=False), evaluate=False), + } + for case, result in cases.items(): + assert sympify(case, evaluate=False) == result + + +def test_issue_4133(): + a = sympify('Integer(4)') + + assert a == Integer(4) + assert a.is_Integer + + +def test_issue_3982(): + a = [3, 2.0] + assert sympify(a) == [Integer(3), Float(2.0)] + assert sympify(tuple(a)) == Tuple(Integer(3), Float(2.0)) + assert sympify(set(a)) == FiniteSet(Integer(3), Float(2.0)) + + +def test_S_sympify(): + assert S(1)/2 == sympify(1)/2 == S.Half + assert (-2)**(S(1)/2) == sqrt(2)*I + + +def test_issue_4788(): + assert srepr(S(1.0 + 0J)) == srepr(S(1.0)) == srepr(Float(1.0)) + + +def test_issue_4798_None(): + assert S(None) is None + + +def test_issue_3218(): + assert sympify("x+\ny") == x + y + +def test_issue_19399(): + if not numpy: + skip("numpy not installed.") + + a = numpy.array(Rational(1, 2)) + b = Rational(1, 3) + assert (a * b, type(a * b)) == (b * a, type(b * a)) + + +def test_issue_4988_builtins(): + C = Symbol('C') + vars = {'C': C} + exp1 = sympify('C') + assert exp1 == C # Make sure it did not get mixed up with sympy.C + + exp2 = sympify('C', vars) + assert exp2 == C # Make sure it did not get mixed up with sympy.C + + +def test_geometry(): + p = sympify(Point(0, 1)) + assert p == Point(0, 1) and isinstance(p, Point) + L = sympify(Line(p, (1, 0))) + assert L == Line((0, 1), (1, 0)) and isinstance(L, Line) + + +def test_kernS(): + s = '-1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x)))' + # when 1497 is fixed, this no longer should pass: the expression + # should be unchanged + assert -1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) == -1 + # sympification should not allow the constant to enter a Mul + # or else the structure can change dramatically + ss = kernS(s) + assert ss != -1 and ss.simplify() == -1 + s = '-1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x)))'.replace( + 'x', '_kern') + ss = kernS(s) + assert ss != -1 and ss.simplify() == -1 + # issue 6687 + assert (kernS('Interval(-1,-2 - 4*(-3))') + == Interval(-1, Add(-2, Mul(12, 1, evaluate=False), evaluate=False))) + assert kernS('_kern') == Symbol('_kern') + assert kernS('E**-(x)') == exp(-x) + e = 2*(x + y)*y + assert kernS(['2*(x + y)*y', ('2*(x + y)*y',)]) == [e, (e,)] + assert kernS('-(2*sin(x)**2 + 2*sin(x)*cos(x))*y/2') == \ + -y*(2*sin(x)**2 + 2*sin(x)*cos(x))/2 + # issue 15132 + assert kernS('(1 - x)/(1 - x*(1-y))') == kernS('(1-x)/(1-(1-y)*x)') + assert kernS('(1-2**-(4+1)*(1-y)*x)') == (1 - x*(1 - y)/32) + assert kernS('(1-2**(4+1)*(1-y)*x)') == (1 - 32*x*(1 - y)) + assert kernS('(1-2.*(1-y)*x)') == 1 - 2.*x*(1 - y) + one = kernS('x - (x - 1)') + assert one != 1 and one.expand() == 1 + assert kernS("(2*x)/(x-1)") == 2*x/(x-1) + + +def test_issue_6540_6552(): + assert S('[[1/3,2], (2/5,)]') == [[Rational(1, 3), 2], (Rational(2, 5),)] + assert S('[[2/6,2], (2/4,)]') == [[Rational(1, 3), 2], (S.Half,)] + assert S('[[[2*(1)]]]') == [[[2]]] + assert S('Matrix([2*(1)])') == Matrix([2]) + + +def test_issue_6046(): + assert str(S("Q & C", locals=_clash1)) == 'C & Q' + assert str(S('pi(x)', locals=_clash2)) == 'pi(x)' + locals = {} + exec("from sympy.abc import Q, C", locals) + assert str(S('C&Q', locals)) == 'C & Q' + # clash can act as Symbol or Function + assert str(S('pi(C, Q)', locals=_clash)) == 'pi(C, Q)' + assert len(S('pi + x', locals=_clash2).free_symbols) == 2 + # but not both + raises(TypeError, lambda: S('pi + pi(x)', locals=_clash2)) + assert all(set(i.values()) == {null} for i in ( + _clash, _clash1, _clash2)) + + +def test_issue_8821_highprec_from_str(): + s = str(pi.evalf(128)) + p = sympify(s) + assert Abs(sin(p)) < 1e-127 + + +def test_issue_10295(): + if not numpy: + skip("numpy not installed.") + + A = numpy.array([[1, 3, -1], + [0, 1, 7]]) + sA = S(A) + assert sA.shape == (2, 3) + for (ri, ci), val in numpy.ndenumerate(A): + assert sA[ri, ci] == val + + B = numpy.array([-7, x, 3*y**2]) + sB = S(B) + assert sB.shape == (3,) + assert B[0] == sB[0] == -7 + assert B[1] == sB[1] == x + assert B[2] == sB[2] == 3*y**2 + + C = numpy.arange(0, 24) + C.resize(2,3,4) + sC = S(C) + assert sC[0, 0, 0].is_integer + assert sC[0, 0, 0] == 0 + + a1 = numpy.array([1, 2, 3]) + a2 = numpy.array(list(range(24))) + a2.resize(2, 4, 3) + assert sympify(a1) == ImmutableDenseNDimArray([1, 2, 3]) + assert sympify(a2) == ImmutableDenseNDimArray(list(range(24)), (2, 4, 3)) + + +def test_Range(): + # Only works in Python 3 where range returns a range type + assert sympify(range(10)) == Range(10) + assert _sympify(range(10)) == Range(10) + + +def test_sympify_set(): + n = Symbol('n') + assert sympify({n}) == FiniteSet(n) + assert sympify(set()) == EmptySet + + +def test_sympify_numpy(): + if not numpy: + skip('numpy not installed. Abort numpy tests.') + np = numpy + + def equal(x, y): + return x == y and type(x) == type(y) + + assert sympify(np.bool_(1)) is S(True) + try: + assert equal( + sympify(np.int_(1234567891234567891)), S(1234567891234567891)) + assert equal( + sympify(np.intp(1234567891234567891)), S(1234567891234567891)) + except OverflowError: + # May fail on 32-bit systems: Python int too large to convert to C long + pass + assert equal(sympify(np.intc(1234567891)), S(1234567891)) + assert equal(sympify(np.int8(-123)), S(-123)) + assert equal(sympify(np.int16(-12345)), S(-12345)) + assert equal(sympify(np.int32(-1234567891)), S(-1234567891)) + assert equal( + sympify(np.int64(-1234567891234567891)), S(-1234567891234567891)) + assert equal(sympify(np.uint8(123)), S(123)) + assert equal(sympify(np.uint16(12345)), S(12345)) + assert equal(sympify(np.uint32(1234567891)), S(1234567891)) + assert equal( + sympify(np.uint64(1234567891234567891)), S(1234567891234567891)) + assert equal(sympify(np.float32(1.123456)), Float(1.123456, precision=24)) + assert equal(sympify(np.float64(1.1234567891234)), + Float(1.1234567891234, precision=53)) + + # The exact precision of np.longdouble, npfloat128 and other extended + # precision dtypes is platform dependent. + ldprec = np.finfo(np.longdouble(1)).nmant + 1 + assert equal(sympify(np.longdouble(1.123456789)), + Float(1.123456789, precision=ldprec)) + + assert equal(sympify(np.complex64(1 + 2j)), S(1.0 + 2.0*I)) + assert equal(sympify(np.complex128(1 + 2j)), S(1.0 + 2.0*I)) + + lcprec = np.finfo(np.clongdouble(1)).nmant + 1 + assert equal(sympify(np.clongdouble(1 + 2j)), + Float(1.0, precision=lcprec) + Float(2.0, precision=lcprec)*I) + + #float96 does not exist on all platforms + if hasattr(np, 'float96'): + f96prec = np.finfo(np.float96(1)).nmant + 1 + assert equal(sympify(np.float96(1.123456789)), + Float(1.123456789, precision=f96prec)) + + #float128 does not exist on all platforms + if hasattr(np, 'float128'): + f128prec = np.finfo(np.float128(1)).nmant + 1 + assert equal(sympify(np.float128(1.123456789123)), + Float(1.123456789123, precision=f128prec)) + + +@XFAIL +def test_sympify_rational_numbers_set(): + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify({'.3', '.2'}, rational=True) == FiniteSet(*ans) + + +def test_sympify_mro(): + """Tests the resolution order for classes that implement _sympy_""" + class a: + def _sympy_(self): + return Integer(1) + class b(a): + def _sympy_(self): + return Integer(2) + class c(a): + pass + + assert sympify(a()) == Integer(1) + assert sympify(b()) == Integer(2) + assert sympify(c()) == Integer(1) + + +def test_sympify_converter(): + """Tests the resolution order for classes in converter""" + class a: + pass + class b(a): + pass + class c(a): + pass + + converter[a] = lambda x: Integer(1) + converter[b] = lambda x: Integer(2) + + assert sympify(a()) == Integer(1) + assert sympify(b()) == Integer(2) + assert sympify(c()) == Integer(1) + + class MyInteger(Integer): + pass + + if int in converter: + int_converter = converter[int] + else: + int_converter = None + + try: + converter[int] = MyInteger + assert sympify(1) == MyInteger(1) + finally: + if int_converter is None: + del converter[int] + else: + converter[int] = int_converter + + +def test_issue_13924(): + if not numpy: + skip("numpy not installed.") + + a = sympify(numpy.array([1])) + assert isinstance(a, ImmutableDenseNDimArray) + assert a[0] == 1 + + +def test_numpy_sympify_args(): + # Issue 15098. Make sure sympify args work with numpy types (like numpy.str_) + if not numpy: + skip("numpy not installed.") + + a = sympify(numpy.str_('a')) + assert type(a) is Symbol + assert a == Symbol('a') + + class CustomSymbol(Symbol): + pass + + a = sympify(numpy.str_('a'), {"Symbol": CustomSymbol}) + assert isinstance(a, CustomSymbol) + + a = sympify(numpy.str_('x^y')) + assert a == x**y + a = sympify(numpy.str_('x^y'), convert_xor=False) + assert a == Xor(x, y) + + raises(SympifyError, lambda: sympify(numpy.str_('x'), strict=True)) + + a = sympify(numpy.str_('1.1')) + assert isinstance(a, Float) + assert a == 1.1 + + a = sympify(numpy.str_('1.1'), rational=True) + assert isinstance(a, Rational) + assert a == Rational(11, 10) + + a = sympify(numpy.str_('x + x')) + assert isinstance(a, Mul) + assert a == 2*x + + a = sympify(numpy.str_('x + x'), evaluate=False) + assert isinstance(a, Add) + assert a == Add(x, x, evaluate=False) + + +def test_issue_5939(): + a = Symbol('a') + b = Symbol('b') + assert sympify('''a+\nb''') == a + b + + +def test_issue_16759(): + d = sympify({.5: 1}) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + d = sympify(OrderedDict({.5: 1})) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + d = sympify(defaultdict(int, {.5: 1})) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + + +def test_issue_17811(): + a = Function('a') + assert sympify('a(x)*5', evaluate=False) == Mul(a(x), 5, evaluate=False) + + +def test_issue_8439(): + assert sympify(float('inf')) == oo + assert x + float('inf') == x + oo + assert S(float('inf')) == oo + + +def test_issue_14706(): + if not numpy: + skip("numpy not installed.") + + z1 = numpy.zeros((1, 1), dtype=numpy.float64) + z2 = numpy.zeros((2, 2), dtype=numpy.float64) + z3 = numpy.zeros((), dtype=numpy.float64) + + y1 = numpy.ones((1, 1), dtype=numpy.float64) + y2 = numpy.ones((2, 2), dtype=numpy.float64) + y3 = numpy.ones((), dtype=numpy.float64) + + assert numpy.all(x + z1 == numpy.full((1, 1), x)) + assert numpy.all(x + z2 == numpy.full((2, 2), x)) + assert numpy.all(z1 + x == numpy.full((1, 1), x)) + assert numpy.all(z2 + x == numpy.full((2, 2), x)) + for z in [z3, + numpy.int64(0), + numpy.float64(0), + numpy.complex64(0)]: + assert x + z == x + assert z + x == x + assert isinstance(x + z, Symbol) + assert isinstance(z + x, Symbol) + + # If these tests fail, then it means that numpy has finally + # fixed the issue of scalar conversion for rank>0 arrays + # which is mentioned in numpy/numpy#10404. In that case, + # some changes have to be made in sympify.py. + # Note: For future reference, for anyone who takes up this + # issue when numpy has finally fixed their side of the problem, + # the changes for this temporary fix were introduced in PR 18651 + assert numpy.all(x + y1 == numpy.full((1, 1), x + 1.0)) + assert numpy.all(x + y2 == numpy.full((2, 2), x + 1.0)) + assert numpy.all(y1 + x == numpy.full((1, 1), x + 1.0)) + assert numpy.all(y2 + x == numpy.full((2, 2), x + 1.0)) + for y_ in [y3, + numpy.int64(1), + numpy.float64(1), + numpy.complex64(1)]: + assert x + y_ == y_ + x + assert isinstance(x + y_, Add) + assert isinstance(y_ + x, Add) + + assert x + numpy.array(x) == 2 * x + assert x + numpy.array([x]) == numpy.array([2*x], dtype=object) + + assert sympify(numpy.array([1])) == ImmutableDenseNDimArray([1], 1) + assert sympify(numpy.array([[[1]]])) == ImmutableDenseNDimArray([1], (1, 1, 1)) + assert sympify(z1) == ImmutableDenseNDimArray([0.0], (1, 1)) + assert sympify(z2) == ImmutableDenseNDimArray([0.0, 0.0, 0.0, 0.0], (2, 2)) + assert sympify(z3) == ImmutableDenseNDimArray([0.0], ()) + assert sympify(z3, strict=True) == 0.0 + + raises(SympifyError, lambda: sympify(numpy.array([1]), strict=True)) + raises(SympifyError, lambda: sympify(z1, strict=True)) + raises(SympifyError, lambda: sympify(z2, strict=True)) + + +def test_issue_21536(): + #test to check evaluate=False in case of iterable input + u = sympify("x+3*x+2", evaluate=False) + v = sympify("2*x+4*x+2+4", evaluate=False) + + assert u.is_Add and set(u.args) == {x, 3*x, 2} + assert v.is_Add and set(v.args) == {2*x, 4*x, 2, 4} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"], evaluate=False) == [u, v] + + #test to check evaluate=True in case of iterable input + u = sympify("x+3*x+2", evaluate=True) + v = sympify("2*x+4*x+2+4", evaluate=True) + + assert u.is_Add and set(u.args) == {4*x, 2} + assert v.is_Add and set(v.args) == {6*x, 6} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"], evaluate=True) == [u, v] + + #test to check evaluate with no input in case of iterable input + u = sympify("x+3*x+2") + v = sympify("2*x+4*x+2+4") + + assert u.is_Add and set(u.args) == {4*x, 2} + assert v.is_Add and set(v.args) == {6*x, 6} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"]) == [u, v] + +def test_issue_27284(): + if not numpy: + skip("numpy not installed.") + + assert Float(numpy.float32(float('inf'))) == S.Infinity + assert Float(numpy.float32(float('-inf'))) == S.NegativeInfinity diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py new file mode 100644 index 0000000000000000000000000000000000000000..8bf067283eaba5d4a073a73feb07aac199055a7f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py @@ -0,0 +1,119 @@ +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import symbols +from sympy.core.singleton import S +from sympy.core.function import expand, Function +from sympy.core.numbers import I +from sympy.integrals.integrals import Integral +from sympy.polys.polytools import factor +from sympy.core.traversal import preorder_traversal, use, postorder_traversal, iterargs, iterfreeargs +from sympy.functions.elementary.piecewise import ExprCondPair, Piecewise +from sympy.testing.pytest import warns_deprecated_sympy +from sympy.utilities.iterables import capture + +b1 = Basic() +b2 = Basic(b1) +b3 = Basic(b2) +b21 = Basic(b2, b1) + + +def test_preorder_traversal(): + expr = Basic(b21, b3) + assert list( + preorder_traversal(expr)) == [expr, b21, b2, b1, b1, b3, b2, b1] + assert list(preorder_traversal(('abc', ('d', 'ef')))) == [ + ('abc', ('d', 'ef')), 'abc', ('d', 'ef'), 'd', 'ef'] + + result = [] + pt = preorder_traversal(expr) + for i in pt: + result.append(i) + if i == b2: + pt.skip() + assert result == [expr, b21, b2, b1, b3, b2] + + w, x, y, z = symbols('w:z') + expr = z + w*(x + y) + assert list(preorder_traversal([expr], keys=default_sort_key)) == \ + [[w*(x + y) + z], w*(x + y) + z, z, w*(x + y), w, x + y, x, y] + assert list(preorder_traversal((x + y)*z, keys=True)) == \ + [z*(x + y), z, x + y, x, y] + + +def test_use(): + x, y = symbols('x y') + + assert use(0, expand) == 0 + + f = (x + y)**2*x + 1 + + assert use(f, expand, level=0) == x**3 + 2*x**2*y + x*y**2 + + 1 + assert use(f, expand, level=1) == x**3 + 2*x**2*y + x*y**2 + + 1 + assert use(f, expand, level=2) == 1 + x*(2*x*y + x**2 + y**2) + assert use(f, expand, level=3) == (x + y)**2*x + 1 + + f = (x**2 + 1)**2 - 1 + kwargs = {'gaussian': True} + + assert use(f, factor, level=0, kwargs=kwargs) == x**2*(x**2 + 2) + assert use(f, factor, level=1, kwargs=kwargs) == (x + I)**2*(x - I)**2 - 1 + assert use(f, factor, level=2, kwargs=kwargs) == (x + I)**2*(x - I)**2 - 1 + assert use(f, factor, level=3, kwargs=kwargs) == (x**2 + 1)**2 - 1 + + +def test_postorder_traversal(): + x, y, z, w = symbols('x y z w') + expr = z + w*(x + y) + expected = [z, w, x, y, x + y, w*(x + y), w*(x + y) + z] + assert list(postorder_traversal(expr, keys=default_sort_key)) == expected + assert list(postorder_traversal(expr, keys=True)) == expected + + expr = Piecewise((x, x < 1), (x**2, True)) + expected = [ + x, 1, x, x < 1, ExprCondPair(x, x < 1), + 2, x, x**2, S.true, + ExprCondPair(x**2, True), Piecewise((x, x < 1), (x**2, True)) + ] + assert list(postorder_traversal(expr, keys=default_sort_key)) == expected + assert list(postorder_traversal( + [expr], keys=default_sort_key)) == expected + [[expr]] + + assert list(postorder_traversal(Integral(x**2, (x, 0, 1)), + keys=default_sort_key)) == [ + 2, x, x**2, 0, 1, x, Tuple(x, 0, 1), + Integral(x**2, Tuple(x, 0, 1)) + ] + assert list(postorder_traversal(('abc', ('d', 'ef')))) == [ + 'abc', 'd', 'ef', ('d', 'ef'), ('abc', ('d', 'ef'))] + + +def test_iterargs(): + f = Function('f') + x = symbols('x') + assert list(iterfreeargs(Integral(f(x), (f(x), 1)))) == [ + Integral(f(x), (f(x), 1)), 1] + assert list(iterargs(Integral(f(x), (f(x), 1)))) == [ + Integral(f(x), (f(x), 1)), f(x), (f(x), 1), x, f(x), 1, x] + +def test_deprecated_imports(): + x = symbols('x') + + with warns_deprecated_sympy(): + from sympy.core.basic import preorder_traversal + preorder_traversal(x) + with warns_deprecated_sympy(): + from sympy.simplify.simplify import bottom_up + bottom_up(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.simplify.simplify import walk + walk(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.simplify.traversaltools import use + use(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.utilities.iterables import postorder_traversal + postorder_traversal(x) + with warns_deprecated_sympy(): + from sympy.utilities.iterables import interactive_traversal + capture(lambda: interactive_traversal(x)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py new file mode 100644 index 0000000000000000000000000000000000000000..1fcf9e1ab754d05a3b47e7ec0c2be5ea9929da02 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py @@ -0,0 +1,54 @@ +#this module tests that SymPy works with true division turned on + +from sympy.core.numbers import (Float, Rational) +from sympy.core.symbol import Symbol + + +def test_truediv(): + assert 1/2 != 0 + assert Rational(1)/2 != 0 + + +def dotest(s): + x = Symbol("x") + y = Symbol("y") + l = [ + Rational(2), + Float("1.3"), + x, + y, + pow(x, y)*y, + 5, + 5.5 + ] + for x in l: + for y in l: + s(x, y) + return True + + +def test_basic(): + def s(a, b): + x = a + x = +a + x = -a + x = a + b + x = a - b + x = a*b + x = a/b + x = a**b + del x + assert dotest(s) + + +def test_ibasic(): + def s(a, b): + x = a + x += b + x = a + x -= b + x = a + x *= b + x = a + x /= b + assert dotest(s) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_var.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_var.py new file mode 100644 index 0000000000000000000000000000000000000000..a02709464c9878082fecaf70fa47067ac8838ac6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/tests/test_var.py @@ -0,0 +1,62 @@ +from sympy.core.function import (Function, FunctionClass) +from sympy.core.symbol import (Symbol, var) +from sympy.testing.pytest import raises + +def test_var(): + ns = {"var": var, "raises": raises} + eval("var('a')", ns) + assert ns["a"] == Symbol("a") + + eval("var('b bb cc zz _x')", ns) + assert ns["b"] == Symbol("b") + assert ns["bb"] == Symbol("bb") + assert ns["cc"] == Symbol("cc") + assert ns["zz"] == Symbol("zz") + assert ns["_x"] == Symbol("_x") + + v = eval("var(['d', 'e', 'fg'])", ns) + assert ns['d'] == Symbol('d') + assert ns['e'] == Symbol('e') + assert ns['fg'] == Symbol('fg') + +# check return value + assert v != ['d', 'e', 'fg'] + assert v == [Symbol('d'), Symbol('e'), Symbol('fg')] + + +def test_var_return(): + ns = {"var": var, "raises": raises} + "raises(ValueError, lambda: var(''))" + v2 = eval("var('q')", ns) + v3 = eval("var('q p')", ns) + + assert v2 == Symbol('q') + assert v3 == (Symbol('q'), Symbol('p')) + + +def test_var_accepts_comma(): + ns = {"var": var} + v1 = eval("var('x y z')", ns) + v2 = eval("var('x,y,z')", ns) + v3 = eval("var('x,y z')", ns) + + assert v1 == v2 + assert v1 == v3 + + +def test_var_keywords(): + ns = {"var": var} + eval("var('x y', real=True)", ns) + assert ns['x'].is_real and ns['y'].is_real + + +def test_var_cls(): + ns = {"var": var, "Function": Function} + eval("var('f', cls=Function)", ns) + + assert isinstance(ns['f'], FunctionClass) + + eval("var('g,h', cls=Function)", ns) + + assert isinstance(ns['g'], FunctionClass) + assert isinstance(ns['h'], FunctionClass) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/trace.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/trace.py new file mode 100644 index 0000000000000000000000000000000000000000..58326ce1fdd5038f0b5805afe7c453314a22cb6a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/trace.py @@ -0,0 +1,12 @@ +from sympy.utilities.exceptions import sympy_deprecation_warning + +sympy_deprecation_warning( + """ + sympy.core.trace is deprecated. Use sympy.physics.quantum.trace + instead. + """, + deprecated_since_version="1.10", + active_deprecations_target="sympy-core-trace-deprecated", +) + +from sympy.physics.quantum.trace import Tr # noqa:F401 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/traversal.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/traversal.py new file mode 100644 index 0000000000000000000000000000000000000000..e4e000ef44bf636b9adc700964a7ee4c2372a019 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/core/traversal.py @@ -0,0 +1,304 @@ +from __future__ import annotations + +from typing import Iterator + +from .basic import Basic +from .sorting import ordered +from .sympify import sympify +from sympy.utilities.iterables import iterable + + + +def iterargs(expr): + """Yield the args of a Basic object in a breadth-first traversal. + Depth-traversal stops if `arg.args` is either empty or is not + an iterable. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x + >>> f = Function('f') + >>> from sympy.core.traversal import iterargs + >>> list(iterargs(Integral(f(x), (f(x), 1)))) + [Integral(f(x), (f(x), 1)), f(x), (f(x), 1), x, f(x), 1, x] + + See Also + ======== + iterfreeargs, preorder_traversal + """ + args = [expr] + for i in args: + yield i + args.extend(i.args) + + +def iterfreeargs(expr, _first=True): + """Yield the args of a Basic object in a breadth-first traversal. + Depth-traversal stops if `arg.args` is either empty or is not + an iterable. The bound objects of an expression will be returned + as canonical variables. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x + >>> f = Function('f') + >>> from sympy.core.traversal import iterfreeargs + >>> list(iterfreeargs(Integral(f(x), (f(x), 1)))) + [Integral(f(x), (f(x), 1)), 1] + + See Also + ======== + iterargs, preorder_traversal + """ + args = [expr] + for i in args: + yield i + if _first and hasattr(i, 'bound_symbols'): + void = i.canonical_variables.values() + for i in iterfreeargs(i.as_dummy(), _first=False): + if not i.has(*void): + yield i + args.extend(i.args) + + +class preorder_traversal: + """ + Do a pre-order traversal of a tree. + + This iterator recursively yields nodes that it has visited in a pre-order + fashion. That is, it yields the current node then descends through the + tree breadth-first to yield all of a node's children's pre-order + traversal. + + + For an expression, the order of the traversal depends on the order of + .args, which in many cases can be arbitrary. + + Parameters + ========== + node : SymPy expression + The expression to traverse. + keys : (default None) sort key(s) + The key(s) used to sort args of Basic objects. When None, args of Basic + objects are processed in arbitrary order. If key is defined, it will + be passed along to ordered() as the only key(s) to use to sort the + arguments; if ``key`` is simply True then the default keys of ordered + will be used. + + Yields + ====== + subtree : SymPy expression + All of the subtrees in the tree. + + Examples + ======== + + >>> from sympy import preorder_traversal, symbols + >>> x, y, z = symbols('x y z') + + The nodes are returned in the order that they are encountered unless key + is given; simply passing key=True will guarantee that the traversal is + unique. + + >>> list(preorder_traversal((x + y)*z, keys=None)) # doctest: +SKIP + [z*(x + y), z, x + y, y, x] + >>> list(preorder_traversal((x + y)*z, keys=True)) + [z*(x + y), z, x + y, x, y] + + """ + def __init__(self, node, keys=None): + self._skip_flag = False + self._pt = self._preorder_traversal(node, keys) + + def _preorder_traversal(self, node, keys): + yield node + if self._skip_flag: + self._skip_flag = False + return + if isinstance(node, Basic): + if not keys and hasattr(node, '_argset'): + # LatticeOp keeps args as a set. We should use this if we + # don't care about the order, to prevent unnecessary sorting. + args = node._argset + else: + args = node.args + if keys: + if keys != True: + args = ordered(args, keys, default=False) + else: + args = ordered(args) + for arg in args: + yield from self._preorder_traversal(arg, keys) + elif iterable(node): + for item in node: + yield from self._preorder_traversal(item, keys) + + def skip(self): + """ + Skip yielding current node's (last yielded node's) subtrees. + + Examples + ======== + + >>> from sympy import preorder_traversal, symbols + >>> x, y, z = symbols('x y z') + >>> pt = preorder_traversal((x + y*z)*z) + >>> for i in pt: + ... print(i) + ... if i == x + y*z: + ... pt.skip() + z*(x + y*z) + z + x + y*z + """ + self._skip_flag = True + + def __next__(self): + return next(self._pt) + + def __iter__(self) -> Iterator[Basic]: + return self + + +def use(expr, func, level=0, args=(), kwargs={}): + """ + Use ``func`` to transform ``expr`` at the given level. + + Examples + ======== + + >>> from sympy import use, expand + >>> from sympy.abc import x, y + + >>> f = (x + y)**2*x + 1 + + >>> use(f, expand, level=2) + x*(x**2 + 2*x*y + y**2) + 1 + >>> expand(f) + x**3 + 2*x**2*y + x*y**2 + 1 + + """ + def _use(expr, level): + if not level: + return func(expr, *args, **kwargs) + else: + if expr.is_Atom: + return expr + else: + level -= 1 + _args = [_use(arg, level) for arg in expr.args] + return expr.__class__(*_args) + + return _use(sympify(expr), level) + + +def walk(e, *target): + """Iterate through the args that are the given types (target) and + return a list of the args that were traversed; arguments + that are not of the specified types are not traversed. + + Examples + ======== + + >>> from sympy.core.traversal import walk + >>> from sympy import Min, Max + >>> from sympy.abc import x, y, z + >>> list(walk(Min(x, Max(y, Min(1, z))), Min)) + [Min(x, Max(y, Min(1, z)))] + >>> list(walk(Min(x, Max(y, Min(1, z))), Min, Max)) + [Min(x, Max(y, Min(1, z))), Max(y, Min(1, z)), Min(1, z)] + + See Also + ======== + + bottom_up + """ + if isinstance(e, target): + yield e + for i in e.args: + yield from walk(i, *target) + + +def bottom_up(rv, F, atoms=False, nonbasic=False): + """Apply ``F`` to all expressions in an expression tree from the + bottom up. If ``atoms`` is True, apply ``F`` even if there are no args; + if ``nonbasic`` is True, try to apply ``F`` to non-Basic objects. + """ + args = getattr(rv, 'args', None) + if args is not None: + if args: + args = tuple([bottom_up(a, F, atoms, nonbasic) for a in args]) + if args != rv.args: + rv = rv.func(*args) + rv = F(rv) + elif atoms: + rv = F(rv) + else: + if nonbasic: + try: + rv = F(rv) + except TypeError: + pass + + return rv + + +def postorder_traversal(node, keys=None): + """ + Do a postorder traversal of a tree. + + This generator recursively yields nodes that it has visited in a postorder + fashion. That is, it descends through the tree depth-first to yield all of + a node's children's postorder traversal before yielding the node itself. + + Parameters + ========== + + node : SymPy expression + The expression to traverse. + keys : (default None) sort key(s) + The key(s) used to sort args of Basic objects. When None, args of Basic + objects are processed in arbitrary order. If key is defined, it will + be passed along to ordered() as the only key(s) to use to sort the + arguments; if ``key`` is simply True then the default keys of + ``ordered`` will be used (node count and default_sort_key). + + Yields + ====== + subtree : SymPy expression + All of the subtrees in the tree. + + Examples + ======== + + >>> from sympy import postorder_traversal + >>> from sympy.abc import w, x, y, z + + The nodes are returned in the order that they are encountered unless key + is given; simply passing key=True will guarantee that the traversal is + unique. + + >>> list(postorder_traversal(w + (x + y)*z)) # doctest: +SKIP + [z, y, x, x + y, z*(x + y), w, w + z*(x + y)] + >>> list(postorder_traversal(w + (x + y)*z, keys=True)) + [w, z, x, y, x + y, z*(x + y), w + z*(x + y)] + + + """ + if isinstance(node, Basic): + args = node.args + if keys: + if keys != True: + args = ordered(args, keys, default=False) + else: + args = ordered(args) + for arg in args: + yield from postorder_traversal(arg, keys) + elif iterable(node): + for item in node: + yield from postorder_traversal(item, keys) + yield node diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8846a99510601c9675103e21ef5a0a1e839fdd11 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/__init__.py @@ -0,0 +1,19 @@ +from .diffgeom import ( + BaseCovarDerivativeOp, BaseScalarField, BaseVectorField, Commutator, + contravariant_order, CoordSystem, CoordinateSymbol, + CovarDerivativeOp, covariant_order, Differential, intcurve_diffequ, + intcurve_series, LieDerivative, Manifold, metric_to_Christoffel_1st, + metric_to_Christoffel_2nd, metric_to_Ricci_components, + metric_to_Riemann_components, Patch, Point, TensorProduct, twoform_to_matrix, + vectors_in_basis, WedgeProduct, +) + +__all__ = [ + 'BaseCovarDerivativeOp', 'BaseScalarField', 'BaseVectorField', 'Commutator', + 'contravariant_order', 'CoordSystem', 'CoordinateSymbol', + 'CovarDerivativeOp', 'covariant_order', 'Differential', 'intcurve_diffequ', + 'intcurve_series', 'LieDerivative', 'Manifold', 'metric_to_Christoffel_1st', + 'metric_to_Christoffel_2nd', 'metric_to_Ricci_components', + 'metric_to_Riemann_components', 'Patch', 'Point', 'TensorProduct', + 'twoform_to_matrix', 'vectors_in_basis', 'WedgeProduct', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py new file mode 100644 index 0000000000000000000000000000000000000000..a95f83122d6de0b7015b9a3ad0573cbfd97a7ef3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py @@ -0,0 +1,2270 @@ +from __future__ import annotations +from typing import Any + +from functools import reduce +from itertools import permutations + +from sympy.combinatorics import Permutation +from sympy.core import ( + Basic, Expr, Function, diff, + Pow, Mul, Add, Lambda, S, Tuple, Dict +) +from sympy.core.cache import cacheit + +from sympy.core.symbol import Symbol, Dummy +from sympy.core.symbol import Str +from sympy.core.sympify import _sympify +from sympy.functions import factorial +from sympy.matrices import ImmutableDenseMatrix as Matrix +from sympy.solvers import solve + +from sympy.utilities.exceptions import (sympy_deprecation_warning, + SymPyDeprecationWarning, + ignore_warnings) + + +# TODO you are a bit excessive in the use of Dummies +# TODO dummy point, literal field +# TODO too often one needs to call doit or simplify on the output, check the +# tests and find out why +from sympy.tensor.array import ImmutableDenseNDimArray + + +class Manifold(Basic): + """ + A mathematical manifold. + + Explanation + =========== + + A manifold is a topological space that locally resembles + Euclidean space near each point [1]. + This class does not provide any means to study the topological + characteristics of the manifold that it represents, though. + + Parameters + ========== + + name : str + The name of the manifold. + + dim : int + The dimension of the manifold. + + Examples + ======== + + >>> from sympy.diffgeom import Manifold + >>> m = Manifold('M', 2) + >>> m + M + >>> m.dim + 2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Manifold + """ + + def __new__(cls, name, dim, **kwargs): + if not isinstance(name, Str): + name = Str(name) + dim = _sympify(dim) + obj = super().__new__(cls, name, dim) + + obj.patches = _deprecated_list( + """ + Manifold.patches is deprecated. The Manifold object is now + immutable. Instead use a separate list to keep track of the + patches. + """, []) + return obj + + @property + def name(self): + return self.args[0] + + @property + def dim(self): + return self.args[1] + + +class Patch(Basic): + """ + A patch on a manifold. + + Explanation + =========== + + Coordinate patch, or patch in short, is a simply-connected open set around + a point in the manifold [1]. On a manifold one can have many patches that + do not always include the whole manifold. On these patches coordinate + charts can be defined that permit the parameterization of any point on the + patch in terms of a tuple of real numbers (the coordinates). + + This class does not provide any means to study the topological + characteristics of the patch that it represents. + + Parameters + ========== + + name : str + The name of the patch. + + manifold : Manifold + The manifold on which the patch is defined. + + Examples + ======== + + >>> from sympy.diffgeom import Manifold, Patch + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> p + P + >>> p.dim + 2 + + References + ========== + + .. [1] G. Sussman, J. Wisdom, W. Farr, Functional Differential Geometry + (2013) + + """ + def __new__(cls, name, manifold, **kwargs): + if not isinstance(name, Str): + name = Str(name) + obj = super().__new__(cls, name, manifold) + + obj.manifold.patches.append(obj) # deprecated + obj.coord_systems = _deprecated_list( + """ + Patch.coord_systms is deprecated. The Patch class is now + immutable. Instead use a separate list to keep track of coordinate + systems. + """, []) + return obj + + @property + def name(self): + return self.args[0] + + @property + def manifold(self): + return self.args[1] + + @property + def dim(self): + return self.manifold.dim + + +class CoordSystem(Basic): + """ + A coordinate system defined on the patch. + + Explanation + =========== + + Coordinate system is a system that uses one or more coordinates to uniquely + determine the position of the points or other geometric elements on a + manifold [1]. + + By passing ``Symbols`` to *symbols* parameter, user can define the name and + assumptions of coordinate symbols of the coordinate system. If not passed, + these symbols are generated automatically and are assumed to be real valued. + + By passing *relations* parameter, user can define the transform relations of + coordinate systems. Inverse transformation and indirect transformation can + be found automatically. If this parameter is not passed, coordinate + transformation cannot be done. + + Parameters + ========== + + name : str + The name of the coordinate system. + + patch : Patch + The patch where the coordinate system is defined. + + symbols : list of Symbols, optional + Defines the names and assumptions of coordinate symbols. + + relations : dict, optional + Key is a tuple of two strings, who are the names of the systems where + the coordinates transform from and transform to. + Value is a tuple of the symbols before transformation and a tuple of + the expressions after transformation. + + Examples + ======== + + We define two-dimensional Cartesian coordinate system and polar coordinate + system. + + >>> from sympy import symbols, pi, sqrt, atan2, cos, sin + >>> from sympy.diffgeom import Manifold, Patch, CoordSystem + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> x, y = symbols('x y', real=True) + >>> r, theta = symbols('r theta', nonnegative=True) + >>> relation_dict = { + ... ('Car2D', 'Pol'): [(x, y), (sqrt(x**2 + y**2), atan2(y, x))], + ... ('Pol', 'Car2D'): [(r, theta), (r*cos(theta), r*sin(theta))] + ... } + >>> Car2D = CoordSystem('Car2D', p, (x, y), relation_dict) + >>> Pol = CoordSystem('Pol', p, (r, theta), relation_dict) + + ``symbols`` property returns ``CoordinateSymbol`` instances. These symbols + are not same with the symbols used to construct the coordinate system. + + >>> Car2D + Car2D + >>> Car2D.dim + 2 + >>> Car2D.symbols + (x, y) + >>> _[0].func + + + ``transformation()`` method returns the transformation function from + one coordinate system to another. ``transform()`` method returns the + transformed coordinates. + + >>> Car2D.transformation(Pol) + Lambda((x, y), Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]])) + >>> Car2D.transform(Pol) + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> Car2D.transform(Pol, [1, 2]) + Matrix([ + [sqrt(5)], + [atan(2)]]) + + ``jacobian()`` method returns the Jacobian matrix of coordinate + transformation between two systems. ``jacobian_determinant()`` method + returns the Jacobian determinant of coordinate transformation between two + systems. + + >>> Pol.jacobian(Car2D) + Matrix([ + [cos(theta), -r*sin(theta)], + [sin(theta), r*cos(theta)]]) + >>> Pol.jacobian(Car2D, [1, pi/2]) + Matrix([ + [0, -1], + [1, 0]]) + >>> Car2D.jacobian_determinant(Pol) + 1/sqrt(x**2 + y**2) + >>> Car2D.jacobian_determinant(Pol, [1,0]) + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Coordinate_system + + """ + def __new__(cls, name, patch, symbols=None, relations={}, **kwargs): + if not isinstance(name, Str): + name = Str(name) + + # canonicallize the symbols + if symbols is None: + names = kwargs.get('names', None) + if names is None: + symbols = Tuple( + *[Symbol('%s_%s' % (name.name, i), real=True) + for i in range(patch.dim)] + ) + else: + sympy_deprecation_warning( + f""" +The 'names' argument to CoordSystem is deprecated. Use 'symbols' instead. That +is, replace + + CoordSystem(..., names={names}) + +with + + CoordSystem(..., symbols=[{', '.join(["Symbol(" + repr(n) + ", real=True)" for n in names])}]) + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + symbols = Tuple( + *[Symbol(n, real=True) for n in names] + ) + else: + syms = [] + for s in symbols: + if isinstance(s, Symbol): + syms.append(Symbol(s.name, **s._assumptions.generator)) + elif isinstance(s, str): + sympy_deprecation_warning( + f""" + +Passing a string as the coordinate symbol name to CoordSystem is deprecated. +Pass a Symbol with the appropriate name and assumptions instead. + +That is, replace {s} with Symbol({s!r}, real=True). + """, + + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + syms.append(Symbol(s, real=True)) + symbols = Tuple(*syms) + + # canonicallize the relations + rel_temp = {} + for k,v in relations.items(): + s1, s2 = k + if not isinstance(s1, Str): + s1 = Str(s1) + if not isinstance(s2, Str): + s2 = Str(s2) + key = Tuple(s1, s2) + + # Old version used Lambda as a value. + if isinstance(v, Lambda): + v = (tuple(v.signature), tuple(v.expr)) + else: + v = (tuple(v[0]), tuple(v[1])) + rel_temp[key] = v + relations = Dict(rel_temp) + + # construct the object + obj = super().__new__(cls, name, patch, symbols, relations) + + # Add deprecated attributes + obj.transforms = _deprecated_dict( + """ + CoordSystem.transforms is deprecated. The CoordSystem class is now + immutable. Use the 'relations' keyword argument to the + CoordSystems() constructor to specify relations. + """, {}) + obj._names = [str(n) for n in symbols] + obj.patch.coord_systems.append(obj) # deprecated + obj._dummies = [Dummy(str(n)) for n in symbols] # deprecated + obj._dummy = Dummy() + + return obj + + @property + def name(self): + return self.args[0] + + @property + def patch(self): + return self.args[1] + + @property + def manifold(self): + return self.patch.manifold + + @property + def symbols(self): + return tuple(CoordinateSymbol(self, i, **s._assumptions.generator) + for i,s in enumerate(self.args[2])) + + @property + def relations(self): + return self.args[3] + + @property + def dim(self): + return self.patch.dim + + ########################################################################## + # Finding transformation relation + ########################################################################## + + def transformation(self, sys): + """ + Return coordinate transformation function from *self* to *sys*. + + Parameters + ========== + + sys : CoordSystem + + Returns + ======= + + sympy.Lambda + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.transformation(R2_p) + Lambda((x, y), Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]])) + + """ + signature = self.args[2] + + key = Tuple(self.name, sys.name) + if self == sys: + expr = Matrix(self.symbols) + elif key in self.relations: + expr = Matrix(self.relations[key][1]) + elif key[::-1] in self.relations: + expr = Matrix(self._inverse_transformation(sys, self)) + else: + expr = Matrix(self._indirect_transformation(self, sys)) + return Lambda(signature, expr) + + @staticmethod + def _solve_inverse(sym1, sym2, exprs, sys1_name, sys2_name): + ret = solve( + [t[0] - t[1] for t in zip(sym2, exprs)], + list(sym1), dict=True) + + if len(ret) == 0: + temp = "Cannot solve inverse relation from {} to {}." + raise NotImplementedError(temp.format(sys1_name, sys2_name)) + elif len(ret) > 1: + temp = "Obtained multiple inverse relation from {} to {}." + raise ValueError(temp.format(sys1_name, sys2_name)) + + return ret[0] + + @classmethod + def _inverse_transformation(cls, sys1, sys2): + # Find the transformation relation from sys2 to sys1 + forward = sys1.transform(sys2) + inv_results = cls._solve_inverse(sys1.symbols, sys2.symbols, forward, + sys1.name, sys2.name) + signature = tuple(sys1.symbols) + return [inv_results[s] for s in signature] + + @classmethod + @cacheit + def _indirect_transformation(cls, sys1, sys2): + # Find the transformation relation between two indirectly connected + # coordinate systems + rel = sys1.relations + path = cls._dijkstra(sys1, sys2) + + transforms = [] + for s1, s2 in zip(path, path[1:]): + if (s1, s2) in rel: + transforms.append(rel[(s1, s2)]) + else: + sym2, inv_exprs = rel[(s2, s1)] + sym1 = tuple(Dummy() for i in sym2) + ret = cls._solve_inverse(sym2, sym1, inv_exprs, s2, s1) + ret = tuple(ret[s] for s in sym2) + transforms.append((sym1, ret)) + syms = sys1.args[2] + exprs = syms + for newsyms, newexprs in transforms: + exprs = tuple(e.subs(zip(newsyms, exprs)) for e in newexprs) + return exprs + + @staticmethod + def _dijkstra(sys1, sys2): + # Use Dijkstra algorithm to find the shortest path between two indirectly-connected + # coordinate systems + # return value is the list of the names of the systems. + relations = sys1.relations + graph = {} + for s1, s2 in relations.keys(): + if s1 not in graph: + graph[s1] = {s2} + else: + graph[s1].add(s2) + if s2 not in graph: + graph[s2] = {s1} + else: + graph[s2].add(s1) + + path_dict = {sys:[0, [], 0] for sys in graph} # minimum distance, path, times of visited + + def visit(sys): + path_dict[sys][2] = 1 + for newsys in graph[sys]: + distance = path_dict[sys][0] + 1 + if path_dict[newsys][0] >= distance or not path_dict[newsys][1]: + path_dict[newsys][0] = distance + path_dict[newsys][1] = list(path_dict[sys][1]) + path_dict[newsys][1].append(sys) + + visit(sys1.name) + + while True: + min_distance = max(path_dict.values(), key=lambda x:x[0])[0] + newsys = None + for sys, lst in path_dict.items(): + if 0 < lst[0] <= min_distance and not lst[2]: + min_distance = lst[0] + newsys = sys + if newsys is None: + break + visit(newsys) + + result = path_dict[sys2.name][1] + result.append(sys2.name) + + if result == [sys2.name]: + raise KeyError("Two coordinate systems are not connected.") + return result + + def connect_to(self, to_sys, from_coords, to_exprs, inverse=True, fill_in_gaps=False): + sympy_deprecation_warning( + """ + The CoordSystem.connect_to() method is deprecated. Instead, + generate a new instance of CoordSystem with the 'relations' + keyword argument (CoordSystem classes are now immutable). + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + + from_coords, to_exprs = dummyfy(from_coords, to_exprs) + self.transforms[to_sys] = Matrix(from_coords), Matrix(to_exprs) + + if inverse: + to_sys.transforms[self] = self._inv_transf(from_coords, to_exprs) + + if fill_in_gaps: + self._fill_gaps_in_transformations() + + @staticmethod + def _inv_transf(from_coords, to_exprs): + # Will be removed when connect_to is removed + inv_from = [i.as_dummy() for i in from_coords] + inv_to = solve( + [t[0] - t[1] for t in zip(inv_from, to_exprs)], + list(from_coords), dict=True)[0] + inv_to = [inv_to[fc] for fc in from_coords] + return Matrix(inv_from), Matrix(inv_to) + + @staticmethod + def _fill_gaps_in_transformations(): + # Will be removed when connect_to is removed + raise NotImplementedError + + ########################################################################## + # Coordinate transformations + ########################################################################## + + def transform(self, sys, coordinates=None): + """ + Return the result of coordinate transformation from *self* to *sys*. + If coordinates are not given, coordinate symbols of *self* are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.ImmutableDenseMatrix containing CoordinateSymbol + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.transform(R2_p) + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> R2_r.transform(R2_p, [0, 1]) + Matrix([ + [ 1], + [pi/2]]) + + """ + if coordinates is None: + coordinates = self.symbols + if self != sys: + transf = self.transformation(sys) + coordinates = transf(*coordinates) + else: + coordinates = Matrix(coordinates) + return coordinates + + def coord_tuple_transform_to(self, to_sys, coords): + """Transform ``coords`` to coord system ``to_sys``.""" + sympy_deprecation_warning( + """ + The CoordSystem.coord_tuple_transform_to() method is deprecated. + Use the CoordSystem.transform() method instead. + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + + coords = Matrix(coords) + if self != to_sys: + with ignore_warnings(SymPyDeprecationWarning): + transf = self.transforms[to_sys] + coords = transf[1].subs(list(zip(transf[0], coords))) + return coords + + def jacobian(self, sys, coordinates=None): + """ + Return the jacobian matrix of a transformation on given coordinates. + If coordinates are not given, coordinate symbols of *self* are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.ImmutableDenseMatrix + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_p.jacobian(R2_r) + Matrix([ + [cos(theta), -rho*sin(theta)], + [sin(theta), rho*cos(theta)]]) + >>> R2_p.jacobian(R2_r, [1, 0]) + Matrix([ + [1, 0], + [0, 1]]) + + """ + result = self.transform(sys).jacobian(self.symbols) + if coordinates is not None: + result = result.subs(list(zip(self.symbols, coordinates))) + return result + jacobian_matrix = jacobian + + def jacobian_determinant(self, sys, coordinates=None): + """ + Return the jacobian determinant of a transformation on given + coordinates. If coordinates are not given, coordinate symbols of *self* + are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.Expr + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.jacobian_determinant(R2_p) + 1/sqrt(x**2 + y**2) + >>> R2_r.jacobian_determinant(R2_p, [1, 0]) + 1 + + """ + return self.jacobian(sys, coordinates).det() + + + ########################################################################## + # Points + ########################################################################## + + def point(self, coords): + """Create a ``Point`` with coordinates given in this coord system.""" + return Point(self, coords) + + def point_to_coords(self, point): + """Calculate the coordinates of a point in this coord system.""" + return point.coords(self) + + ########################################################################## + # Base fields. + ########################################################################## + + def base_scalar(self, coord_index): + """Return ``BaseScalarField`` that takes a point and returns one of the coordinates.""" + return BaseScalarField(self, coord_index) + coord_function = base_scalar + + def base_scalars(self): + """Returns a list of all coordinate functions. + For more details see the ``base_scalar`` method of this class.""" + return [self.base_scalar(i) for i in range(self.dim)] + coord_functions = base_scalars + + def base_vector(self, coord_index): + """Return a basis vector field. + The basis vector field for this coordinate system. It is also an + operator on scalar fields.""" + return BaseVectorField(self, coord_index) + + def base_vectors(self): + """Returns a list of all base vectors. + For more details see the ``base_vector`` method of this class.""" + return [self.base_vector(i) for i in range(self.dim)] + + def base_oneform(self, coord_index): + """Return a basis 1-form field. + The basis one-form field for this coordinate system. It is also an + operator on vector fields.""" + return Differential(self.coord_function(coord_index)) + + def base_oneforms(self): + """Returns a list of all base oneforms. + For more details see the ``base_oneform`` method of this class.""" + return [self.base_oneform(i) for i in range(self.dim)] + + +class CoordinateSymbol(Symbol): + """A symbol which denotes an abstract value of i-th coordinate of + the coordinate system with given context. + + Explanation + =========== + + Each coordinates in coordinate system are represented by unique symbol, + such as x, y, z in Cartesian coordinate system. + + You may not construct this class directly. Instead, use `symbols` method + of CoordSystem. + + Parameters + ========== + + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import symbols, Lambda, Matrix, sqrt, atan2, cos, sin + >>> from sympy.diffgeom import Manifold, Patch, CoordSystem + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> x, y = symbols('x y', real=True) + >>> r, theta = symbols('r theta', nonnegative=True) + >>> relation_dict = { + ... ('Car2D', 'Pol'): Lambda((x, y), Matrix([sqrt(x**2 + y**2), atan2(y, x)])), + ... ('Pol', 'Car2D'): Lambda((r, theta), Matrix([r*cos(theta), r*sin(theta)])) + ... } + >>> Car2D = CoordSystem('Car2D', p, [x, y], relation_dict) + >>> Pol = CoordSystem('Pol', p, [r, theta], relation_dict) + >>> x, y = Car2D.symbols + + ``CoordinateSymbol`` contains its coordinate symbol and index. + + >>> x.name + 'x' + >>> x.coord_sys == Car2D + True + >>> x.index + 0 + >>> x.is_real + True + + You can transform ``CoordinateSymbol`` into other coordinate system using + ``rewrite()`` method. + + >>> x.rewrite(Pol) + r*cos(theta) + >>> sqrt(x**2 + y**2).rewrite(Pol).simplify() + r + + """ + def __new__(cls, coord_sys, index, **assumptions): + name = coord_sys.args[2][index].name + obj = super().__new__(cls, name, **assumptions) + obj.coord_sys = coord_sys + obj.index = index + return obj + + def __getnewargs__(self): + return (self.coord_sys, self.index) + + def _hashable_content(self): + return ( + self.coord_sys, self.index + ) + tuple(sorted(self.assumptions0.items())) + + def _eval_rewrite(self, rule, args, **hints): + if isinstance(rule, CoordSystem): + return rule.transform(self.coord_sys)[self.index] + return super()._eval_rewrite(rule, args, **hints) + + +class Point(Basic): + """Point defined in a coordinate system. + + Explanation + =========== + + Mathematically, point is defined in the manifold and does not have any coordinates + by itself. Coordinate system is what imbues the coordinates to the point by coordinate + chart. However, due to the difficulty of realizing such logic, you must supply + a coordinate system and coordinates to define a Point here. + + The usage of this object after its definition is independent of the + coordinate system that was used in order to define it, however due to + limitations in the simplification routines you can arrive at complicated + expressions if you use inappropriate coordinate systems. + + Parameters + ========== + + coord_sys : CoordSystem + + coords : list + The coordinates of the point. + + Examples + ======== + + >>> from sympy import pi + >>> from sympy.diffgeom import Point + >>> from sympy.diffgeom.rn import R2, R2_r, R2_p + >>> rho, theta = R2_p.symbols + + >>> p = Point(R2_p, [rho, 3*pi/4]) + + >>> p.manifold == R2 + True + + >>> p.coords() + Matrix([ + [ rho], + [3*pi/4]]) + >>> p.coords(R2_r) + Matrix([ + [-sqrt(2)*rho/2], + [ sqrt(2)*rho/2]]) + + """ + + def __new__(cls, coord_sys, coords, **kwargs): + coords = Matrix(coords) + obj = super().__new__(cls, coord_sys, coords) + obj._coord_sys = coord_sys + obj._coords = coords + return obj + + @property + def patch(self): + return self._coord_sys.patch + + @property + def manifold(self): + return self._coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def coords(self, sys=None): + """ + Coordinates of the point in given coordinate system. If coordinate system + is not passed, it returns the coordinates in the coordinate system in which + the point was defined. + """ + if sys is None: + return self._coords + else: + return self._coord_sys.transform(sys, self._coords) + + @property + def free_symbols(self): + return self._coords.free_symbols + + +class BaseScalarField(Expr): + """Base scalar field over a manifold for a given coordinate system. + + Explanation + =========== + + A scalar field takes a point as an argument and returns a scalar. + A base scalar field of a coordinate system takes a point and returns one of + the coordinates of that point in the coordinate system in question. + + To define a scalar field you need to choose the coordinate system and the + index of the coordinate. + + The use of the scalar field after its definition is independent of the + coordinate system in which it was defined, however due to limitations in + the simplification routines you may arrive at more complicated + expression if you use unappropriate coordinate systems. + You can build complicated scalar fields by just building up SymPy + expressions containing ``BaseScalarField`` instances. + + Parameters + ========== + + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import Function, pi + >>> from sympy.diffgeom import BaseScalarField + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> rho, _ = R2_p.symbols + >>> point = R2_p.point([rho, 0]) + >>> fx, fy = R2_r.base_scalars() + >>> ftheta = BaseScalarField(R2_r, 1) + + >>> fx(point) + rho + >>> fy(point) + 0 + + >>> (fx**2+fy**2).rcall(point) + rho**2 + + >>> g = Function('g') + >>> fg = g(ftheta-pi) + >>> fg.rcall(point) + g(-pi) + + """ + + is_commutative = True + + def __new__(cls, coord_sys, index, **kwargs): + index = _sympify(index) + obj = super().__new__(cls, coord_sys, index) + obj._coord_sys = coord_sys + obj._index = index + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def patch(self): + return self.coord_sys.patch + + @property + def manifold(self): + return self.coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def __call__(self, *args): + """Evaluating the field at a point or doing nothing. + If the argument is a ``Point`` instance, the field is evaluated at that + point. The field is returned itself if the argument is any other + object. It is so in order to have working recursive calling mechanics + for all fields (check the ``__call__`` method of ``Expr``). + """ + point = args[0] + if len(args) != 1 or not isinstance(point, Point): + return self + coords = point.coords(self._coord_sys) + # XXX Calling doit is necessary with all the Subs expressions + # XXX Calling simplify is necessary with all the trig expressions + return simplify(coords[self._index]).doit() + + # XXX Workaround for limitations on the content of args + free_symbols: set[Any] = set() + + +class BaseVectorField(Expr): + r"""Base vector field over a manifold for a given coordinate system. + + Explanation + =========== + + A vector field is an operator taking a scalar field and returning a + directional derivative (which is also a scalar field). + A base vector field is the same type of operator, however the derivation is + specifically done with respect to a chosen coordinate. + + To define a base vector field you need to choose the coordinate system and + the index of the coordinate. + + The use of the vector field after its definition is independent of the + coordinate system in which it was defined, however due to limitations in the + simplification routines you may arrive at more complicated expression if you + use unappropriate coordinate systems. + + Parameters + ========== + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import BaseVectorField + >>> from sympy import pprint + + >>> x, y = R2_r.symbols + >>> rho, theta = R2_p.symbols + >>> fx, fy = R2_r.base_scalars() + >>> point_p = R2_p.point([rho, theta]) + >>> point_r = R2_r.point([x, y]) + + >>> g = Function('g') + >>> s_field = g(fx, fy) + + >>> v = BaseVectorField(R2_r, 1) + >>> pprint(v(s_field)) + / d \| + |---(g(x, xi))|| + \dxi /|xi=y + >>> pprint(v(s_field).rcall(point_r).doit()) + d + --(g(x, y)) + dy + >>> pprint(v(s_field).rcall(point_p)) + / d \| + |---(g(rho*cos(theta), xi))|| + \dxi /|xi=rho*sin(theta) + + """ + + is_commutative = False + + def __new__(cls, coord_sys, index, **kwargs): + index = _sympify(index) + obj = super().__new__(cls, coord_sys, index) + obj._coord_sys = coord_sys + obj._index = index + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def patch(self): + return self.coord_sys.patch + + @property + def manifold(self): + return self.coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def __call__(self, scalar_field): + """Apply on a scalar field. + The action of a vector field on a scalar field is a directional + differentiation. + If the argument is not a scalar field an error is raised. + """ + if covariant_order(scalar_field) or contravariant_order(scalar_field): + raise ValueError('Only scalar fields can be supplied as arguments to vector fields.') + + if scalar_field is None: + return self + + base_scalars = list(scalar_field.atoms(BaseScalarField)) + + # First step: e_x(x+r**2) -> e_x(x) + 2*r*e_x(r) + d_var = self._coord_sys._dummy + # TODO: you need a real dummy function for the next line + d_funcs = [Function('_#_%s' % i)(d_var) for i, + b in enumerate(base_scalars)] + d_result = scalar_field.subs(list(zip(base_scalars, d_funcs))) + d_result = d_result.diff(d_var) + + # Second step: e_x(x) -> 1 and e_x(r) -> cos(atan2(x, y)) + coords = self._coord_sys.symbols + d_funcs_deriv = [f.diff(d_var) for f in d_funcs] + d_funcs_deriv_sub = [] + for b in base_scalars: + jac = self._coord_sys.jacobian(b._coord_sys, coords) + d_funcs_deriv_sub.append(jac[b._index, self._index]) + d_result = d_result.subs(list(zip(d_funcs_deriv, d_funcs_deriv_sub))) + + # Remove the dummies + result = d_result.subs(list(zip(d_funcs, base_scalars))) + result = result.subs(list(zip(coords, self._coord_sys.coord_functions()))) + return result.doit() + + +def _find_coords(expr): + # Finds CoordinateSystems existing in expr + fields = expr.atoms(BaseScalarField, BaseVectorField) + return {f._coord_sys for f in fields} + + +class Commutator(Expr): + r"""Commutator of two vector fields. + + Explanation + =========== + + The commutator of two vector fields `v_1` and `v_2` is defined as the + vector field `[v_1, v_2]` that evaluated on each scalar field `f` is equal + to `v_1(v_2(f)) - v_2(v_1(f))`. + + Examples + ======== + + + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import Commutator + >>> from sympy import simplify + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> e_r = R2_p.base_vector(0) + + >>> c_xy = Commutator(e_x, e_y) + >>> c_xr = Commutator(e_x, e_r) + >>> c_xy + 0 + + Unfortunately, the current code is not able to compute everything: + + >>> c_xr + Commutator(e_x, e_rho) + >>> simplify(c_xr(fy**2)) + -2*cos(theta)*y**2/(x**2 + y**2) + + """ + def __new__(cls, v1, v2): + if (covariant_order(v1) or contravariant_order(v1) != 1 + or covariant_order(v2) or contravariant_order(v2) != 1): + raise ValueError( + 'Only commutators of vector fields are supported.') + if v1 == v2: + return S.Zero + coord_sys = set().union(*[_find_coords(v) for v in (v1, v2)]) + if len(coord_sys) == 1: + # Only one coordinate systems is used, hence it is easy enough to + # actually evaluate the commutator. + if all(isinstance(v, BaseVectorField) for v in (v1, v2)): + return S.Zero + bases_1, bases_2 = [list(v.atoms(BaseVectorField)) + for v in (v1, v2)] + coeffs_1 = [v1.expand().coeff(b) for b in bases_1] + coeffs_2 = [v2.expand().coeff(b) for b in bases_2] + res = 0 + for c1, b1 in zip(coeffs_1, bases_1): + for c2, b2 in zip(coeffs_2, bases_2): + res += c1*b1(c2)*b2 - c2*b2(c1)*b1 + return res + else: + obj = super().__new__(cls, v1, v2) + obj._v1 = v1 # deprecated assignment + obj._v2 = v2 # deprecated assignment + return obj + + @property + def v1(self): + return self.args[0] + + @property + def v2(self): + return self.args[1] + + def __call__(self, scalar_field): + """Apply on a scalar field. + If the argument is not a scalar field an error is raised. + """ + return self.v1(self.v2(scalar_field)) - self.v2(self.v1(scalar_field)) + + +class Differential(Expr): + r"""Return the differential (exterior derivative) of a form field. + + Explanation + =========== + + The differential of a form (i.e. the exterior derivative) has a complicated + definition in the general case. + The differential `df` of the 0-form `f` is defined for any vector field `v` + as `df(v) = v(f)`. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import Differential + >>> from sympy import pprint + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> g = Function('g') + >>> s_field = g(fx, fy) + >>> dg = Differential(s_field) + + >>> dg + d(g(x, y)) + >>> pprint(dg(e_x)) + / d \| + |---(g(xi, y))|| + \dxi /|xi=x + >>> pprint(dg(e_y)) + / d \| + |---(g(x, xi))|| + \dxi /|xi=y + + Applying the exterior derivative operator twice always results in: + + >>> Differential(dg) + 0 + """ + + is_commutative = False + + def __new__(cls, form_field): + if contravariant_order(form_field): + raise ValueError( + 'A vector field was supplied as an argument to Differential.') + if isinstance(form_field, Differential): + return S.Zero + else: + obj = super().__new__(cls, form_field) + obj._form_field = form_field # deprecated assignment + return obj + + @property + def form_field(self): + return self.args[0] + + def __call__(self, *vector_fields): + """Apply on a list of vector_fields. + + Explanation + =========== + + If the number of vector fields supplied is not equal to 1 + the order of + the form field inside the differential the result is undefined. + + For 1-forms (i.e. differentials of scalar fields) the evaluation is + done as `df(v)=v(f)`. However if `v` is ``None`` instead of a vector + field, the differential is returned unchanged. This is done in order to + permit partial contractions for higher forms. + + In the general case the evaluation is done by applying the form field + inside the differential on a list with one less elements than the number + of elements in the original list. Lowering the number of vector fields + is achieved through replacing each pair of fields by their + commutator. + + If the arguments are not vectors or ``None``s an error is raised. + """ + if any((contravariant_order(a) != 1 or covariant_order(a)) and a is not None + for a in vector_fields): + raise ValueError('The arguments supplied to Differential should be vector fields or Nones.') + k = len(vector_fields) + if k == 1: + if vector_fields[0]: + return vector_fields[0].rcall(self._form_field) + return self + else: + # For higher form it is more complicated: + # Invariant formula: + # https://en.wikipedia.org/wiki/Exterior_derivative#Invariant_formula + # df(v1, ... vn) = +/- vi(f(v1..no i..vn)) + # +/- f([vi,vj],v1..no i, no j..vn) + f = self._form_field + v = vector_fields + ret = 0 + for i in range(k): + t = v[i].rcall(f.rcall(*v[:i] + v[i + 1:])) + ret += (-1)**i*t + for j in range(i + 1, k): + c = Commutator(v[i], v[j]) + if c: # TODO this is ugly - the Commutator can be Zero and + # this causes the next line to fail + t = f.rcall(*(c,) + v[:i] + v[i + 1:j] + v[j + 1:]) + ret += (-1)**(i + j)*t + return ret + + +class TensorProduct(Expr): + """Tensor product of forms. + + Explanation + =========== + + The tensor product permits the creation of multilinear functionals (i.e. + higher order tensors) out of lower order fields (e.g. 1-forms and vector + fields). However, the higher tensors thus created lack the interesting + features provided by the other type of product, the wedge product, namely + they are not antisymmetric and hence are not form fields. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import TensorProduct + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> TensorProduct(dx, dy)(e_x, e_y) + 1 + >>> TensorProduct(dx, dy)(e_y, e_x) + 0 + >>> TensorProduct(dx, fx*dy)(fx*e_x, e_y) + x**2 + >>> TensorProduct(e_x, e_y)(fx**2, fy**2) + 4*x*y + >>> TensorProduct(e_y, dx)(fy) + dx + + You can nest tensor products. + + >>> tp1 = TensorProduct(dx, dy) + >>> TensorProduct(tp1, dx)(e_x, e_y, e_x) + 1 + + You can make partial contraction for instance when 'raising an index'. + Putting ``None`` in the second argument of ``rcall`` means that the + respective position in the tensor product is left as it is. + + >>> TP = TensorProduct + >>> metric = TP(dx, dx) + 3*TP(dy, dy) + >>> metric.rcall(e_y, None) + 3*dy + + Or automatically pad the args with ``None`` without specifying them. + + >>> metric.rcall(e_y) + 3*dy + + """ + def __new__(cls, *args): + scalar = Mul(*[m for m in args if covariant_order(m) + contravariant_order(m) == 0]) + multifields = [m for m in args if covariant_order(m) + contravariant_order(m)] + if multifields: + if len(multifields) == 1: + return scalar*multifields[0] + return scalar*super().__new__(cls, *multifields) + else: + return scalar + + def __call__(self, *fields): + """Apply on a list of fields. + + If the number of input fields supplied is not equal to the order of + the tensor product field, the list of arguments is padded with ``None``'s. + + The list of arguments is divided in sublists depending on the order of + the forms inside the tensor product. The sublists are provided as + arguments to these forms and the resulting expressions are given to the + constructor of ``TensorProduct``. + + """ + tot_order = covariant_order(self) + contravariant_order(self) + tot_args = len(fields) + if tot_args != tot_order: + fields = list(fields) + [None]*(tot_order - tot_args) + orders = [covariant_order(f) + contravariant_order(f) for f in self._args] + indices = [sum(orders[:i + 1]) for i in range(len(orders) - 1)] + fields = [fields[i:j] for i, j in zip([0] + indices, indices + [None])] + multipliers = [t[0].rcall(*t[1]) for t in zip(self._args, fields)] + return TensorProduct(*multipliers) + + +class WedgeProduct(TensorProduct): + """Wedge product of forms. + + Explanation + =========== + + In the context of integration only completely antisymmetric forms make + sense. The wedge product permits the creation of such forms. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import WedgeProduct + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> WedgeProduct(dx, dy)(e_x, e_y) + 1 + >>> WedgeProduct(dx, dy)(e_y, e_x) + -1 + >>> WedgeProduct(dx, fx*dy)(fx*e_x, e_y) + x**2 + >>> WedgeProduct(e_x, e_y)(fy, None) + -e_x + + You can nest wedge products. + + >>> wp1 = WedgeProduct(dx, dy) + >>> WedgeProduct(wp1, dx)(e_x, e_y, e_x) + 0 + + """ + # TODO the calculation of signatures is slow + # TODO you do not need all these permutations (neither the prefactor) + def __call__(self, *fields): + """Apply on a list of vector_fields. + The expression is rewritten internally in terms of tensor products and evaluated.""" + orders = (covariant_order(e) + contravariant_order(e) for e in self.args) + mul = 1/Mul(*(factorial(o) for o in orders)) + perms = permutations(fields) + perms_par = (Permutation( + p).signature() for p in permutations(range(len(fields)))) + tensor_prod = TensorProduct(*self.args) + return mul*Add(*[tensor_prod(*p[0])*p[1] for p in zip(perms, perms_par)]) + + +class LieDerivative(Expr): + """Lie derivative with respect to a vector field. + + Explanation + =========== + + The transport operator that defines the Lie derivative is the pushforward of + the field to be derived along the integral curve of the field with respect + to which one derives. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> from sympy.diffgeom import (LieDerivative, TensorProduct) + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> e_rho, e_theta = R2_p.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> LieDerivative(e_x, fy) + 0 + >>> LieDerivative(e_x, fx) + 1 + >>> LieDerivative(e_x, e_x) + 0 + + The Lie derivative of a tensor field by another tensor field is equal to + their commutator: + + >>> LieDerivative(e_x, e_rho) + Commutator(e_x, e_rho) + >>> LieDerivative(e_x + e_y, fx) + 1 + + >>> tp = TensorProduct(dx, dy) + >>> LieDerivative(e_x, tp) + LieDerivative(e_x, TensorProduct(dx, dy)) + >>> LieDerivative(e_x, tp) + LieDerivative(e_x, TensorProduct(dx, dy)) + + """ + def __new__(cls, v_field, expr): + expr_form_ord = covariant_order(expr) + if contravariant_order(v_field) != 1 or covariant_order(v_field): + raise ValueError('Lie derivatives are defined only with respect to' + ' vector fields. The supplied argument was not a ' + 'vector field.') + if expr_form_ord > 0: + obj = super().__new__(cls, v_field, expr) + # deprecated assignments + obj._v_field = v_field + obj._expr = expr + return obj + if expr.atoms(BaseVectorField): + return Commutator(v_field, expr) + else: + return v_field.rcall(expr) + + @property + def v_field(self): + return self.args[0] + + @property + def expr(self): + return self.args[1] + + def __call__(self, *args): + v = self.v_field + expr = self.expr + lead_term = v(expr(*args)) + rest = Add(*[Mul(*args[:i] + (Commutator(v, args[i]),) + args[i + 1:]) + for i in range(len(args))]) + return lead_term - rest + + +class BaseCovarDerivativeOp(Expr): + """Covariant derivative operator with respect to a base vector. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import BaseCovarDerivativeOp + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + + >>> TP = TensorProduct + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> ch = metric_to_Christoffel_2nd(TP(dx, dx) + TP(dy, dy)) + >>> ch + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> cvd = BaseCovarDerivativeOp(R2_r, 0, ch) + >>> cvd(fx) + 1 + >>> cvd(fx*e_x) + e_x + """ + + def __new__(cls, coord_sys, index, christoffel): + index = _sympify(index) + christoffel = ImmutableDenseNDimArray(christoffel) + obj = super().__new__(cls, coord_sys, index, christoffel) + # deprecated assignments + obj._coord_sys = coord_sys + obj._index = index + obj._christoffel = christoffel + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def christoffel(self): + return self.args[2] + + def __call__(self, field): + """Apply on a scalar field. + + The action of a vector field on a scalar field is a directional + differentiation. + If the argument is not a scalar field the behaviour is undefined. + """ + if covariant_order(field) != 0: + raise NotImplementedError() + + field = vectors_in_basis(field, self._coord_sys) + + wrt_vector = self._coord_sys.base_vector(self._index) + wrt_scalar = self._coord_sys.coord_function(self._index) + vectors = list(field.atoms(BaseVectorField)) + + # First step: replace all vectors with something susceptible to + # derivation and do the derivation + # TODO: you need a real dummy function for the next line + d_funcs = [Function('_#_%s' % i)(wrt_scalar) for i, + b in enumerate(vectors)] + d_result = field.subs(list(zip(vectors, d_funcs))) + d_result = wrt_vector(d_result) + + # Second step: backsubstitute the vectors in + d_result = d_result.subs(list(zip(d_funcs, vectors))) + + # Third step: evaluate the derivatives of the vectors + derivs = [] + for v in vectors: + d = Add(*[(self._christoffel[k, wrt_vector._index, v._index] + *v._coord_sys.base_vector(k)) + for k in range(v._coord_sys.dim)]) + derivs.append(d) + to_subs = [wrt_vector(d) for d in d_funcs] + # XXX: This substitution can fail when there are Dummy symbols and the + # cache is disabled: https://github.com/sympy/sympy/issues/17794 + result = d_result.subs(list(zip(to_subs, derivs))) + + # Remove the dummies + result = result.subs(list(zip(d_funcs, vectors))) + return result.doit() + + +class CovarDerivativeOp(Expr): + """Covariant derivative operator. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import CovarDerivativeOp + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + >>> TP = TensorProduct + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + >>> ch = metric_to_Christoffel_2nd(TP(dx, dx) + TP(dy, dy)) + + >>> ch + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> cvd = CovarDerivativeOp(fx*e_x, ch) + >>> cvd(fx) + x + >>> cvd(fx*e_x) + x*e_x + + """ + + def __new__(cls, wrt, christoffel): + if len({v._coord_sys for v in wrt.atoms(BaseVectorField)}) > 1: + raise NotImplementedError() + if contravariant_order(wrt) != 1 or covariant_order(wrt): + raise ValueError('Covariant derivatives are defined only with ' + 'respect to vector fields. The supplied argument ' + 'was not a vector field.') + christoffel = ImmutableDenseNDimArray(christoffel) + obj = super().__new__(cls, wrt, christoffel) + # deprecated assignments + obj._wrt = wrt + obj._christoffel = christoffel + return obj + + @property + def wrt(self): + return self.args[0] + + @property + def christoffel(self): + return self.args[1] + + def __call__(self, field): + vectors = list(self._wrt.atoms(BaseVectorField)) + base_ops = [BaseCovarDerivativeOp(v._coord_sys, v._index, self._christoffel) + for v in vectors] + return self._wrt.subs(list(zip(vectors, base_ops))).rcall(field) + + +############################################################################### +# Integral curves on vector fields +############################################################################### +def intcurve_series(vector_field, param, start_point, n=6, coord_sys=None, coeffs=False): + r"""Return the series expansion for an integral curve of the field. + + Explanation + =========== + + Integral curve is a function `\gamma` taking a parameter in `R` to a point + in the manifold. It verifies the equation: + + `V(f)\big(\gamma(t)\big) = \frac{d}{dt}f\big(\gamma(t)\big)` + + where the given ``vector_field`` is denoted as `V`. This holds for any + value `t` for the parameter and any scalar field `f`. + + This equation can also be decomposed of a basis of coordinate functions + `V(f_i)\big(\gamma(t)\big) = \frac{d}{dt}f_i\big(\gamma(t)\big) \quad \forall i` + + This function returns a series expansion of `\gamma(t)` in terms of the + coordinate system ``coord_sys``. The equations and expansions are necessarily + done in coordinate-system-dependent way as there is no other way to + represent movement between points on the manifold (i.e. there is no such + thing as a difference of points for a general manifold). + + Parameters + ========== + vector_field + the vector field for which an integral curve will be given + + param + the argument of the function `\gamma` from R to the curve + + start_point + the point which corresponds to `\gamma(0)` + + n + the order to which to expand + + coord_sys + the coordinate system in which to expand + coeffs (default False) - if True return a list of elements of the expansion + + Examples + ======== + + Use the predefined R2 manifold: + + >>> from sympy.abc import t, x, y + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import intcurve_series + + Specify a starting point and a vector field: + + >>> start_point = R2_r.point([x, y]) + >>> vector_field = R2_r.e_x + + Calculate the series: + + >>> intcurve_series(vector_field, t, start_point, n=3) + Matrix([ + [t + x], + [ y]]) + + Or get the elements of the expansion in a list: + + >>> series = intcurve_series(vector_field, t, start_point, n=3, coeffs=True) + >>> series[0] + Matrix([ + [x], + [y]]) + >>> series[1] + Matrix([ + [t], + [0]]) + >>> series[2] + Matrix([ + [0], + [0]]) + + The series in the polar coordinate system: + + >>> series = intcurve_series(vector_field, t, start_point, + ... n=3, coord_sys=R2_p, coeffs=True) + >>> series[0] + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> series[1] + Matrix([ + [t*x/sqrt(x**2 + y**2)], + [ -t*y/(x**2 + y**2)]]) + >>> series[2] + Matrix([ + [t**2*(-x**2/(x**2 + y**2)**(3/2) + 1/sqrt(x**2 + y**2))/2], + [ t**2*x*y/(x**2 + y**2)**2]]) + + See Also + ======== + + intcurve_diffequ + + """ + if contravariant_order(vector_field) != 1 or covariant_order(vector_field): + raise ValueError('The supplied field was not a vector field.') + + def iter_vfield(scalar_field, i): + """Return ``vector_field`` called `i` times on ``scalar_field``.""" + return reduce(lambda s, v: v.rcall(s), [vector_field, ]*i, scalar_field) + + def taylor_terms_per_coord(coord_function): + """Return the series for one of the coordinates.""" + return [param**i*iter_vfield(coord_function, i).rcall(start_point)/factorial(i) + for i in range(n)] + coord_sys = coord_sys if coord_sys else start_point._coord_sys + coord_functions = coord_sys.coord_functions() + taylor_terms = [taylor_terms_per_coord(f) for f in coord_functions] + if coeffs: + return [Matrix(t) for t in zip(*taylor_terms)] + else: + return Matrix([sum(c) for c in taylor_terms]) + + +def intcurve_diffequ(vector_field, param, start_point, coord_sys=None): + r"""Return the differential equation for an integral curve of the field. + + Explanation + =========== + + Integral curve is a function `\gamma` taking a parameter in `R` to a point + in the manifold. It verifies the equation: + + `V(f)\big(\gamma(t)\big) = \frac{d}{dt}f\big(\gamma(t)\big)` + + where the given ``vector_field`` is denoted as `V`. This holds for any + value `t` for the parameter and any scalar field `f`. + + This function returns the differential equation of `\gamma(t)` in terms of the + coordinate system ``coord_sys``. The equations and expansions are necessarily + done in coordinate-system-dependent way as there is no other way to + represent movement between points on the manifold (i.e. there is no such + thing as a difference of points for a general manifold). + + Parameters + ========== + + vector_field + the vector field for which an integral curve will be given + + param + the argument of the function `\gamma` from R to the curve + + start_point + the point which corresponds to `\gamma(0)` + + coord_sys + the coordinate system in which to give the equations + + Returns + ======= + + a tuple of (equations, initial conditions) + + Examples + ======== + + Use the predefined R2 manifold: + + >>> from sympy.abc import t + >>> from sympy.diffgeom.rn import R2, R2_p, R2_r + >>> from sympy.diffgeom import intcurve_diffequ + + Specify a starting point and a vector field: + + >>> start_point = R2_r.point([0, 1]) + >>> vector_field = -R2.y*R2.e_x + R2.x*R2.e_y + + Get the equation: + + >>> equations, init_cond = intcurve_diffequ(vector_field, t, start_point) + >>> equations + [f_1(t) + Derivative(f_0(t), t), -f_0(t) + Derivative(f_1(t), t)] + >>> init_cond + [f_0(0), f_1(0) - 1] + + The series in the polar coordinate system: + + >>> equations, init_cond = intcurve_diffequ(vector_field, t, start_point, R2_p) + >>> equations + [Derivative(f_0(t), t), Derivative(f_1(t), t) - 1] + >>> init_cond + [f_0(0) - 1, f_1(0) - pi/2] + + See Also + ======== + + intcurve_series + + """ + if contravariant_order(vector_field) != 1 or covariant_order(vector_field): + raise ValueError('The supplied field was not a vector field.') + coord_sys = coord_sys if coord_sys else start_point._coord_sys + gammas = [Function('f_%d' % i)(param) for i in range( + start_point._coord_sys.dim)] + arbitrary_p = Point(coord_sys, gammas) + coord_functions = coord_sys.coord_functions() + equations = [simplify(diff(cf.rcall(arbitrary_p), param) - vector_field.rcall(cf).rcall(arbitrary_p)) + for cf in coord_functions] + init_cond = [simplify(cf.rcall(arbitrary_p).subs(param, 0) - cf.rcall(start_point)) + for cf in coord_functions] + return equations, init_cond + + +############################################################################### +# Helpers +############################################################################### +def dummyfy(args, exprs): + # TODO Is this a good idea? + d_args = Matrix([s.as_dummy() for s in args]) + reps = dict(zip(args, d_args)) + d_exprs = Matrix([_sympify(expr).subs(reps) for expr in exprs]) + return d_args, d_exprs + +############################################################################### +# Helpers +############################################################################### +def contravariant_order(expr, _strict=False): + """Return the contravariant order of an expression. + + Examples + ======== + + >>> from sympy.diffgeom import contravariant_order + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.abc import a + + >>> contravariant_order(a) + 0 + >>> contravariant_order(a*R2.x + 2) + 0 + >>> contravariant_order(a*R2.x*R2.e_y + R2.e_x) + 1 + + """ + # TODO move some of this to class methods. + # TODO rewrite using the .as_blah_blah methods + if isinstance(expr, Add): + orders = [contravariant_order(e) for e in expr.args] + if len(set(orders)) != 1: + raise ValueError('Misformed expression containing contravariant fields of varying order.') + return orders[0] + elif isinstance(expr, Mul): + orders = [contravariant_order(e) for e in expr.args] + not_zero = [o for o in orders if o != 0] + if len(not_zero) > 1: + raise ValueError('Misformed expression containing multiplication between vectors.') + return 0 if not not_zero else not_zero[0] + elif isinstance(expr, Pow): + if covariant_order(expr.base) or covariant_order(expr.exp): + raise ValueError( + 'Misformed expression containing a power of a vector.') + return 0 + elif isinstance(expr, BaseVectorField): + return 1 + elif isinstance(expr, TensorProduct): + return sum(contravariant_order(a) for a in expr.args) + elif not _strict or expr.atoms(BaseScalarField): + return 0 + else: # If it does not contain anything related to the diffgeom module and it is _strict + return -1 + + +def covariant_order(expr, _strict=False): + """Return the covariant order of an expression. + + Examples + ======== + + >>> from sympy.diffgeom import covariant_order + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.abc import a + + >>> covariant_order(a) + 0 + >>> covariant_order(a*R2.x + 2) + 0 + >>> covariant_order(a*R2.x*R2.dy + R2.dx) + 1 + + """ + # TODO move some of this to class methods. + # TODO rewrite using the .as_blah_blah methods + if isinstance(expr, Add): + orders = [covariant_order(e) for e in expr.args] + if len(set(orders)) != 1: + raise ValueError('Misformed expression containing form fields of varying order.') + return orders[0] + elif isinstance(expr, Mul): + orders = [covariant_order(e) for e in expr.args] + not_zero = [o for o in orders if o != 0] + if len(not_zero) > 1: + raise ValueError('Misformed expression containing multiplication between forms.') + return 0 if not not_zero else not_zero[0] + elif isinstance(expr, Pow): + if covariant_order(expr.base) or covariant_order(expr.exp): + raise ValueError( + 'Misformed expression containing a power of a form.') + return 0 + elif isinstance(expr, Differential): + return covariant_order(*expr.args) + 1 + elif isinstance(expr, TensorProduct): + return sum(covariant_order(a) for a in expr.args) + elif not _strict or expr.atoms(BaseScalarField): + return 0 + else: # If it does not contain anything related to the diffgeom module and it is _strict + return -1 + + +############################################################################### +# Coordinate transformation functions +############################################################################### +def vectors_in_basis(expr, to_sys): + """Transform all base vectors in base vectors of a specified coord basis. + While the new base vectors are in the new coordinate system basis, any + coefficients are kept in the old system. + + Examples + ======== + + >>> from sympy.diffgeom import vectors_in_basis + >>> from sympy.diffgeom.rn import R2_r, R2_p + + >>> vectors_in_basis(R2_r.e_x, R2_p) + -y*e_theta/(x**2 + y**2) + x*e_rho/sqrt(x**2 + y**2) + >>> vectors_in_basis(R2_p.e_r, R2_r) + sin(theta)*e_y + cos(theta)*e_x + + """ + vectors = list(expr.atoms(BaseVectorField)) + new_vectors = [] + for v in vectors: + cs = v._coord_sys + jac = cs.jacobian(to_sys, cs.coord_functions()) + new = (jac.T*Matrix(to_sys.base_vectors()))[v._index] + new_vectors.append(new) + return expr.subs(list(zip(vectors, new_vectors))) + + +############################################################################### +# Coordinate-dependent functions +############################################################################### +def twoform_to_matrix(expr): + """Return the matrix representing the twoform. + + For the twoform `w` return the matrix `M` such that `M[i,j]=w(e_i, e_j)`, + where `e_i` is the i-th base vector field for the coordinate system in + which the expression of `w` is given. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import twoform_to_matrix, TensorProduct + >>> TP = TensorProduct + + >>> twoform_to_matrix(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + Matrix([ + [1, 0], + [0, 1]]) + >>> twoform_to_matrix(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + Matrix([ + [x, 0], + [0, 1]]) + >>> twoform_to_matrix(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy) - TP(R2.dx, R2.dy)/2) + Matrix([ + [ 1, 0], + [-1/2, 1]]) + + """ + if covariant_order(expr) != 2 or contravariant_order(expr): + raise ValueError('The input expression is not a two-form.') + coord_sys = _find_coords(expr) + if len(coord_sys) != 1: + raise ValueError('The input expression concerns more than one ' + 'coordinate systems, hence there is no unambiguous ' + 'way to choose a coordinate system for the matrix.') + coord_sys = coord_sys.pop() + vectors = coord_sys.base_vectors() + expr = expr.expand() + matrix_content = [[expr.rcall(v1, v2) for v1 in vectors] + for v2 in vectors] + return Matrix(matrix_content) + + +def metric_to_Christoffel_1st(expr): + """Return the nested list of Christoffel symbols for the given metric. + This returns the Christoffel symbol of first kind that represents the + Levi-Civita connection for the given metric. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Christoffel_1st, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Christoffel_1st(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> metric_to_Christoffel_1st(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[1/2, 0], [0, 0]], [[0, 0], [0, 0]]] + + """ + matrix = twoform_to_matrix(expr) + if not matrix.is_symmetric(): + raise ValueError( + 'The two-form representing the metric is not symmetric.') + coord_sys = _find_coords(expr).pop() + deriv_matrices = [matrix.applyfunc(d) for d in coord_sys.base_vectors()] + indices = list(range(coord_sys.dim)) + christoffel = [[[(deriv_matrices[k][i, j] + deriv_matrices[j][i, k] - deriv_matrices[i][j, k])/2 + for k in indices] + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(christoffel) + + +def metric_to_Christoffel_2nd(expr): + """Return the nested list of Christoffel symbols for the given metric. + This returns the Christoffel symbol of second kind that represents the + Levi-Civita connection for the given metric. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Christoffel_2nd(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> metric_to_Christoffel_2nd(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[1/(2*x), 0], [0, 0]], [[0, 0], [0, 0]]] + + """ + ch_1st = metric_to_Christoffel_1st(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + # XXX workaround, inverting a matrix does not work if it contains non + # symbols + #matrix = twoform_to_matrix(expr).inv() + matrix = twoform_to_matrix(expr) + s_fields = set() + for e in matrix: + s_fields.update(e.atoms(BaseScalarField)) + s_fields = list(s_fields) + dums = coord_sys.symbols + matrix = matrix.subs(list(zip(s_fields, dums))).inv().subs(list(zip(dums, s_fields))) + # XXX end of workaround + christoffel = [[[Add(*[matrix[i, l]*ch_1st[l, j, k] for l in indices]) + for k in indices] + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(christoffel) + + +def metric_to_Riemann_components(expr): + """Return the components of the Riemann tensor expressed in a given basis. + + Given a metric it calculates the components of the Riemann tensor in the + canonical basis of the coordinate system in which the metric expression is + given. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Riemann_components, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Riemann_components(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[[0, 0], [0, 0]], [[0, 0], [0, 0]]], [[[0, 0], [0, 0]], [[0, 0], [0, 0]]]] + >>> non_trivial_metric = exp(2*R2.r)*TP(R2.dr, R2.dr) + \ + R2.r**2*TP(R2.dtheta, R2.dtheta) + >>> non_trivial_metric + exp(2*rho)*TensorProduct(drho, drho) + rho**2*TensorProduct(dtheta, dtheta) + >>> riemann = metric_to_Riemann_components(non_trivial_metric) + >>> riemann[0, :, :, :] + [[[0, 0], [0, 0]], [[0, exp(-2*rho)*rho], [-exp(-2*rho)*rho, 0]]] + >>> riemann[1, :, :, :] + [[[0, -1/rho], [1/rho, 0]], [[0, 0], [0, 0]]] + + """ + ch_2nd = metric_to_Christoffel_2nd(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + deriv_ch = [[[[d(ch_2nd[i, j, k]) + for d in coord_sys.base_vectors()] + for k in indices] + for j in indices] + for i in indices] + riemann_a = [[[[deriv_ch[rho][sig][nu][mu] - deriv_ch[rho][sig][mu][nu] + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + riemann_b = [[[[Add(*[ch_2nd[rho, l, mu]*ch_2nd[l, sig, nu] - ch_2nd[rho, l, nu]*ch_2nd[l, sig, mu] for l in indices]) + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + riemann = [[[[riemann_a[rho][sig][mu][nu] + riemann_b[rho][sig][mu][nu] + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + return ImmutableDenseNDimArray(riemann) + + +def metric_to_Ricci_components(expr): + + """Return the components of the Ricci tensor expressed in a given basis. + + Given a metric it calculates the components of the Ricci tensor in the + canonical basis of the coordinate system in which the metric expression is + given. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Ricci_components, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Ricci_components(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[0, 0], [0, 0]] + >>> non_trivial_metric = exp(2*R2.r)*TP(R2.dr, R2.dr) + \ + R2.r**2*TP(R2.dtheta, R2.dtheta) + >>> non_trivial_metric + exp(2*rho)*TensorProduct(drho, drho) + rho**2*TensorProduct(dtheta, dtheta) + >>> metric_to_Ricci_components(non_trivial_metric) + [[1/rho, 0], [0, exp(-2*rho)*rho]] + + """ + riemann = metric_to_Riemann_components(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + ricci = [[Add(*[riemann[k, i, k, j] for k in indices]) + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(ricci) + +############################################################################### +# Classes for deprecation +############################################################################### + +class _deprecated_container: + # This class gives deprecation warning. + # When deprecated features are completely deleted, this should be removed as well. + # See https://github.com/sympy/sympy/pull/19368 + def __init__(self, message, data): + super().__init__(data) + self.message = message + + def warn(self): + sympy_deprecation_warning( + self.message, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + stacklevel=4 + ) + + def __iter__(self): + self.warn() + return super().__iter__() + + def __getitem__(self, key): + self.warn() + return super().__getitem__(key) + + def __contains__(self, key): + self.warn() + return super().__contains__(key) + + +class _deprecated_list(_deprecated_container, list): + pass + + +class _deprecated_dict(_deprecated_container, dict): + pass + + +# Import at end to avoid cyclic imports +from sympy.simplify.simplify import simplify diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/rn.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/rn.py new file mode 100644 index 0000000000000000000000000000000000000000..897c7e82bc804d260612f79c820af92632f3b281 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/rn.py @@ -0,0 +1,143 @@ +"""Predefined R^n manifolds together with common coord. systems. + +Coordinate systems are predefined as well as the transformation laws between +them. + +Coordinate functions can be accessed as attributes of the manifold (eg `R2.x`), +as attributes of the coordinate systems (eg `R2_r.x` and `R2_p.theta`), or by +using the usual `coord_sys.coord_function(index, name)` interface. +""" + +from typing import Any +import warnings + +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, atan2, cos, sin) +from .diffgeom import Manifold, Patch, CoordSystem + +__all__ = [ + 'R2', 'R2_origin', 'relations_2d', 'R2_r', 'R2_p', + 'R3', 'R3_origin', 'relations_3d', 'R3_r', 'R3_c', 'R3_s' +] + +############################################################################### +# R2 +############################################################################### +R2: Any = Manifold('R^2', 2) + +R2_origin: Any = Patch('origin', R2) + +x, y = symbols('x y', real=True) +r, theta = symbols('rho theta', nonnegative=True) + +relations_2d = { + ('rectangular', 'polar'): [(x, y), (sqrt(x**2 + y**2), atan2(y, x))], + ('polar', 'rectangular'): [(r, theta), (r*cos(theta), r*sin(theta))], +} + +R2_r: Any = CoordSystem('rectangular', R2_origin, (x, y), relations_2d) +R2_p: Any = CoordSystem('polar', R2_origin, (r, theta), relations_2d) + +# support deprecated feature +with warnings.catch_warnings(): + warnings.simplefilter("ignore") + x, y, r, theta = symbols('x y r theta', cls=Dummy) + R2_r.connect_to(R2_p, [x, y], + [sqrt(x**2 + y**2), atan2(y, x)], + inverse=False, fill_in_gaps=False) + R2_p.connect_to(R2_r, [r, theta], + [r*cos(theta), r*sin(theta)], + inverse=False, fill_in_gaps=False) + +# Defining the basis coordinate functions and adding shortcuts for them to the +# manifold and the patch. +R2.x, R2.y = R2_origin.x, R2_origin.y = R2_r.x, R2_r.y = R2_r.coord_functions() +R2.r, R2.theta = R2_origin.r, R2_origin.theta = R2_p.r, R2_p.theta = R2_p.coord_functions() + +# Defining the basis vector fields and adding shortcuts for them to the +# manifold and the patch. +R2.e_x, R2.e_y = R2_origin.e_x, R2_origin.e_y = R2_r.e_x, R2_r.e_y = R2_r.base_vectors() +R2.e_r, R2.e_theta = R2_origin.e_r, R2_origin.e_theta = R2_p.e_r, R2_p.e_theta = R2_p.base_vectors() + +# Defining the basis oneform fields and adding shortcuts for them to the +# manifold and the patch. +R2.dx, R2.dy = R2_origin.dx, R2_origin.dy = R2_r.dx, R2_r.dy = R2_r.base_oneforms() +R2.dr, R2.dtheta = R2_origin.dr, R2_origin.dtheta = R2_p.dr, R2_p.dtheta = R2_p.base_oneforms() + +############################################################################### +# R3 +############################################################################### +R3: Any = Manifold('R^3', 3) + +R3_origin: Any = Patch('origin', R3) + +x, y, z = symbols('x y z', real=True) +rho, psi, r, theta, phi = symbols('rho psi r theta phi', nonnegative=True) + +relations_3d = { + ('rectangular', 'cylindrical'): [(x, y, z), + (sqrt(x**2 + y**2), atan2(y, x), z)], + ('cylindrical', 'rectangular'): [(rho, psi, z), + (rho*cos(psi), rho*sin(psi), z)], + ('rectangular', 'spherical'): [(x, y, z), + (sqrt(x**2 + y**2 + z**2), + acos(z/sqrt(x**2 + y**2 + z**2)), + atan2(y, x))], + ('spherical', 'rectangular'): [(r, theta, phi), + (r*sin(theta)*cos(phi), + r*sin(theta)*sin(phi), + r*cos(theta))], + ('cylindrical', 'spherical'): [(rho, psi, z), + (sqrt(rho**2 + z**2), + acos(z/sqrt(rho**2 + z**2)), + psi)], + ('spherical', 'cylindrical'): [(r, theta, phi), + (r*sin(theta), phi, r*cos(theta))], +} + +R3_r: Any = CoordSystem('rectangular', R3_origin, (x, y, z), relations_3d) +R3_c: Any = CoordSystem('cylindrical', R3_origin, (rho, psi, z), relations_3d) +R3_s: Any = CoordSystem('spherical', R3_origin, (r, theta, phi), relations_3d) + +# support deprecated feature +with warnings.catch_warnings(): + warnings.simplefilter("ignore") + x, y, z, rho, psi, r, theta, phi = symbols('x y z rho psi r theta phi', cls=Dummy) + R3_r.connect_to(R3_c, [x, y, z], + [sqrt(x**2 + y**2), atan2(y, x), z], + inverse=False, fill_in_gaps=False) + R3_c.connect_to(R3_r, [rho, psi, z], + [rho*cos(psi), rho*sin(psi), z], + inverse=False, fill_in_gaps=False) + ## rectangular <-> spherical + R3_r.connect_to(R3_s, [x, y, z], + [sqrt(x**2 + y**2 + z**2), acos(z/ + sqrt(x**2 + y**2 + z**2)), atan2(y, x)], + inverse=False, fill_in_gaps=False) + R3_s.connect_to(R3_r, [r, theta, phi], + [r*sin(theta)*cos(phi), r*sin( + theta)*sin(phi), r*cos(theta)], + inverse=False, fill_in_gaps=False) + ## cylindrical <-> spherical + R3_c.connect_to(R3_s, [rho, psi, z], + [sqrt(rho**2 + z**2), acos(z/sqrt(rho**2 + z**2)), psi], + inverse=False, fill_in_gaps=False) + R3_s.connect_to(R3_c, [r, theta, phi], + [r*sin(theta), phi, r*cos(theta)], + inverse=False, fill_in_gaps=False) + +# Defining the basis coordinate functions. +R3_r.x, R3_r.y, R3_r.z = R3_r.coord_functions() +R3_c.rho, R3_c.psi, R3_c.z = R3_c.coord_functions() +R3_s.r, R3_s.theta, R3_s.phi = R3_s.coord_functions() + +# Defining the basis vector fields. +R3_r.e_x, R3_r.e_y, R3_r.e_z = R3_r.base_vectors() +R3_c.e_rho, R3_c.e_psi, R3_c.e_z = R3_c.base_vectors() +R3_s.e_r, R3_s.e_theta, R3_s.e_phi = R3_s.base_vectors() + +# Defining the basis oneform fields. +R3_r.dx, R3_r.dy, R3_r.dz = R3_r.base_oneforms() +R3_c.drho, R3_c.dpsi, R3_c.dz = R3_c.base_oneforms() +R3_s.dr, R3_s.dtheta, R3_s.dphi = R3_s.base_oneforms() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py new file mode 100644 index 0000000000000000000000000000000000000000..c649fd9fcb9acdf1f410a021966c6e0fee62cc2b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py @@ -0,0 +1,33 @@ +from sympy.diffgeom import Manifold, Patch, CoordSystem, Point +from sympy.core.function import Function +from sympy.core.symbol import symbols +from sympy.testing.pytest import warns_deprecated_sympy + +m = Manifold('m', 2) +p = Patch('p', m) +a, b = symbols('a b') +cs = CoordSystem('cs', p, [a, b]) +x, y = symbols('x y') +f = Function('f') +s1, s2 = cs.coord_functions() +v1, v2 = cs.base_vectors() +f1, f2 = cs.base_oneforms() + +def test_point(): + point = Point(cs, [x, y]) + assert point != Point(cs, [2, y]) + #TODO assert point.subs(x, 2) == Point(cs, [2, y]) + #TODO assert point.free_symbols == set([x, y]) + +def test_subs(): + assert s1.subs(s1, s2) == s2 + assert v1.subs(v1, v2) == v2 + assert f1.subs(f1, f2) == f2 + assert (x*f(s1) + y).subs(s1, s2) == x*f(s2) + y + assert (f(s1)*v1).subs(v1, v2) == f(s1)*v2 + assert (y*f(s1)*f1).subs(f1, f2) == y*f(s1)*f2 + +def test_deprecated(): + with warns_deprecated_sympy(): + cs_wname = CoordSystem('cs', p, ['a', 'b']) + assert cs_wname == cs_wname.func(*cs_wname.args) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py new file mode 100644 index 0000000000000000000000000000000000000000..7c3c9265785896b8f4ffa3a2b41816ca90579758 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py @@ -0,0 +1,342 @@ +from sympy.core import Lambda, Symbol, symbols +from sympy.diffgeom.rn import R2, R2_p, R2_r, R3_r, R3_c, R3_s, R2_origin +from sympy.diffgeom import (Manifold, Patch, CoordSystem, Commutator, Differential, TensorProduct, + WedgeProduct, BaseCovarDerivativeOp, CovarDerivativeOp, LieDerivative, + covariant_order, contravariant_order, twoform_to_matrix, metric_to_Christoffel_1st, + metric_to_Christoffel_2nd, metric_to_Riemann_components, + metric_to_Ricci_components, intcurve_diffequ, intcurve_series) +from sympy.simplify import trigsimp, simplify +from sympy.functions import sqrt, atan2, sin +from sympy.matrices import Matrix +from sympy.testing.pytest import raises, nocache_fail +from sympy.testing.pytest import warns_deprecated_sympy + +TP = TensorProduct + + +def test_coordsys_transform(): + # test inverse transforms + p, q, r, s = symbols('p q r s') + rel = {('first', 'second'): [(p, q), (q, -p)]} + R2_pq = CoordSystem('first', R2_origin, [p, q], rel) + R2_rs = CoordSystem('second', R2_origin, [r, s], rel) + r, s = R2_rs.symbols + assert R2_rs.transform(R2_pq) == Matrix([[-s], [r]]) + + # inverse transform impossible case + a, b = symbols('a b', positive=True) + rel = {('first', 'second'): [(a,), (-a,)]} + R2_a = CoordSystem('first', R2_origin, [a], rel) + R2_b = CoordSystem('second', R2_origin, [b], rel) + # This transformation is uninvertible because there is no positive a, b satisfying a = -b + with raises(NotImplementedError): + R2_b.transform(R2_a) + + # inverse transform ambiguous case + c, d = symbols('c d') + rel = {('first', 'second'): [(c,), (c**2,)]} + R2_c = CoordSystem('first', R2_origin, [c], rel) + R2_d = CoordSystem('second', R2_origin, [d], rel) + # The transform method should throw if it finds multiple inverses for a coordinate transformation. + with raises(ValueError): + R2_d.transform(R2_c) + + # test indirect transformation + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): [(a, b), (2*a, 3*b)], + ('C2', 'C3'): [(c, d), (3*c, 2*d)]} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, d/3]) + assert C1.transform(C3) == Matrix([6*a, 6*b]) + assert C3.transform(C1) == Matrix([e/6, f/6]) + assert C3.transform(C2) == Matrix([e/3, f/2]) + + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): [(a, b), (2*a, 3*b + 1)], + ('C3', 'C2'): [(e, f), (-e - 2, 2*f)]} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, (d - 1)/3]) + assert C1.transform(C3) == Matrix([-2*a - 2, (3*b + 1)/2]) + assert C3.transform(C1) == Matrix([-e/2 - 1, (2*f - 1)/3]) + assert C3.transform(C2) == Matrix([-e - 2, 2*f]) + + # old signature uses Lambda + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): Lambda((a, b), (2*a, 3*b + 1)), + ('C3', 'C2'): Lambda((e, f), (-e - 2, 2*f))} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, (d - 1)/3]) + assert C1.transform(C3) == Matrix([-2*a - 2, (3*b + 1)/2]) + assert C3.transform(C1) == Matrix([-e/2 - 1, (2*f - 1)/3]) + assert C3.transform(C2) == Matrix([-e - 2, 2*f]) + + +def test_R2(): + x0, y0, r0, theta0 = symbols('x0, y0, r0, theta0', real=True) + point_r = R2_r.point([x0, y0]) + point_p = R2_p.point([r0, theta0]) + + # r**2 = x**2 + y**2 + assert (R2.r**2 - R2.x**2 - R2.y**2).rcall(point_r) == 0 + assert trigsimp( (R2.r**2 - R2.x**2 - R2.y**2).rcall(point_p) ) == 0 + assert trigsimp(R2.e_r(R2.x**2 + R2.y**2).rcall(point_p).doit()) == 2*r0 + + # polar->rect->polar == Id + a, b = symbols('a b', positive=True) + m = Matrix([[a], [b]]) + + #TODO assert m == R2_r.transform(R2_p, R2_p.transform(R2_r, [a, b])).applyfunc(simplify) + assert m == R2_p.transform(R2_r, R2_r.transform(R2_p, m)).applyfunc(simplify) + + # deprecated method + with warns_deprecated_sympy(): + assert m == R2_p.coord_tuple_transform_to( + R2_r, R2_r.coord_tuple_transform_to(R2_p, m)).applyfunc(simplify) + + +def test_R3(): + a, b, c = symbols('a b c', positive=True) + m = Matrix([[a], [b], [c]]) + + assert m == R3_c.transform(R3_r, R3_r.transform(R3_c, m)).applyfunc(simplify) + #TODO assert m == R3_r.transform(R3_c, R3_c.transform(R3_r, m)).applyfunc(simplify) + assert m == R3_s.transform( + R3_r, R3_r.transform(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_r.transform(R3_s, R3_s.transform(R3_r, m)).applyfunc(simplify) + assert m == R3_s.transform( + R3_c, R3_c.transform(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_c.transform(R3_s, R3_s.transform(R3_c, m)).applyfunc(simplify) + + with warns_deprecated_sympy(): + assert m == R3_c.coord_tuple_transform_to( + R3_r, R3_r.coord_tuple_transform_to(R3_c, m)).applyfunc(simplify) + #TODO assert m == R3_r.coord_tuple_transform_to(R3_c, R3_c.coord_tuple_transform_to(R3_r, m)).applyfunc(simplify) + assert m == R3_s.coord_tuple_transform_to( + R3_r, R3_r.coord_tuple_transform_to(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_r.coord_tuple_transform_to(R3_s, R3_s.coord_tuple_transform_to(R3_r, m)).applyfunc(simplify) + assert m == R3_s.coord_tuple_transform_to( + R3_c, R3_c.coord_tuple_transform_to(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_c.coord_tuple_transform_to(R3_s, R3_s.coord_tuple_transform_to(R3_c, m)).applyfunc(simplify) + + +def test_CoordinateSymbol(): + x, y = R2_r.symbols + r, theta = R2_p.symbols + assert y.rewrite(R2_p) == r*sin(theta) + + +def test_point(): + x, y = symbols('x, y') + p = R2_r.point([x, y]) + assert p.free_symbols == {x, y} + assert p.coords(R2_r) == p.coords() == Matrix([x, y]) + assert p.coords(R2_p) == Matrix([sqrt(x**2 + y**2), atan2(y, x)]) + + +def test_commutator(): + assert Commutator(R2.e_x, R2.e_y) == 0 + assert Commutator(R2.x*R2.e_x, R2.x*R2.e_x) == 0 + assert Commutator(R2.x*R2.e_x, R2.x*R2.e_y) == R2.x*R2.e_y + c = Commutator(R2.e_x, R2.e_r) + assert c(R2.x) == R2.y*(R2.x**2 + R2.y**2)**(-1)*sin(R2.theta) + + +def test_differential(): + xdy = R2.x*R2.dy + dxdy = Differential(xdy) + assert xdy.rcall(None) == xdy + assert dxdy(R2.e_x, R2.e_y) == 1 + assert dxdy(R2.e_x, R2.x*R2.e_y) == R2.x + assert Differential(dxdy) == 0 + + +def test_products(): + assert TensorProduct( + R2.dx, R2.dy)(R2.e_x, R2.e_y) == R2.dx(R2.e_x)*R2.dy(R2.e_y) == 1 + assert TensorProduct(R2.dx, R2.dy)(None, R2.e_y) == R2.dx + assert TensorProduct(R2.dx, R2.dy)(R2.e_x, None) == R2.dy + assert TensorProduct(R2.dx, R2.dy)(R2.e_x) == R2.dy + assert TensorProduct(R2.x, R2.dx) == R2.x*R2.dx + assert TensorProduct( + R2.e_x, R2.e_y)(R2.x, R2.y) == R2.e_x(R2.x) * R2.e_y(R2.y) == 1 + assert TensorProduct(R2.e_x, R2.e_y)(None, R2.y) == R2.e_x + assert TensorProduct(R2.e_x, R2.e_y)(R2.x, None) == R2.e_y + assert TensorProduct(R2.e_x, R2.e_y)(R2.x) == R2.e_y + assert TensorProduct(R2.x, R2.e_x) == R2.x * R2.e_x + assert TensorProduct( + R2.dx, R2.e_y)(R2.e_x, R2.y) == R2.dx(R2.e_x) * R2.e_y(R2.y) == 1 + assert TensorProduct(R2.dx, R2.e_y)(None, R2.y) == R2.dx + assert TensorProduct(R2.dx, R2.e_y)(R2.e_x, None) == R2.e_y + assert TensorProduct(R2.dx, R2.e_y)(R2.e_x) == R2.e_y + assert TensorProduct(R2.x, R2.e_x) == R2.x * R2.e_x + assert TensorProduct( + R2.e_x, R2.dy)(R2.x, R2.e_y) == R2.e_x(R2.x) * R2.dy(R2.e_y) == 1 + assert TensorProduct(R2.e_x, R2.dy)(None, R2.e_y) == R2.e_x + assert TensorProduct(R2.e_x, R2.dy)(R2.x, None) == R2.dy + assert TensorProduct(R2.e_x, R2.dy)(R2.x) == R2.dy + assert TensorProduct(R2.e_y,R2.e_x)(R2.x**2 + R2.y**2,R2.x**2 + R2.y**2) == 4*R2.x*R2.y + + assert WedgeProduct(R2.dx, R2.dy)(R2.e_x, R2.e_y) == 1 + assert WedgeProduct(R2.e_x, R2.e_y)(R2.x, R2.y) == 1 + + +def test_lie_derivative(): + assert LieDerivative(R2.e_x, R2.y) == R2.e_x(R2.y) == 0 + assert LieDerivative(R2.e_x, R2.x) == R2.e_x(R2.x) == 1 + assert LieDerivative(R2.e_x, R2.e_x) == Commutator(R2.e_x, R2.e_x) == 0 + assert LieDerivative(R2.e_x, R2.e_r) == Commutator(R2.e_x, R2.e_r) + assert LieDerivative(R2.e_x + R2.e_y, R2.x) == 1 + assert LieDerivative( + R2.e_x, TensorProduct(R2.dx, R2.dy))(R2.e_x, R2.e_y) == 0 + + +@nocache_fail +def test_covar_deriv(): + ch = metric_to_Christoffel_2nd(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + cvd = BaseCovarDerivativeOp(R2_r, 0, ch) + assert cvd(R2.x) == 1 + # This line fails if the cache is disabled: + assert cvd(R2.x*R2.e_x) == R2.e_x + cvd = CovarDerivativeOp(R2.x*R2.e_x, ch) + assert cvd(R2.x) == R2.x + assert cvd(R2.x*R2.e_x) == R2.x*R2.e_x + + +def test_intcurve_diffequ(): + t = symbols('t') + start_point = R2_r.point([1, 0]) + vector_field = -R2.y*R2.e_x + R2.x*R2.e_y + equations, init_cond = intcurve_diffequ(vector_field, t, start_point) + assert str(equations) == '[f_1(t) + Derivative(f_0(t), t), -f_0(t) + Derivative(f_1(t), t)]' + assert str(init_cond) == '[f_0(0) - 1, f_1(0)]' + equations, init_cond = intcurve_diffequ(vector_field, t, start_point, R2_p) + assert str( + equations) == '[Derivative(f_0(t), t), Derivative(f_1(t), t) - 1]' + assert str(init_cond) == '[f_0(0) - 1, f_1(0)]' + + +def test_helpers_and_coordinate_dependent(): + one_form = R2.dr + R2.dx + two_form = Differential(R2.x*R2.dr + R2.r*R2.dx) + three_form = Differential( + R2.y*two_form) + Differential(R2.x*Differential(R2.r*R2.dr)) + metric = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dy, R2.dy) + metric_ambig = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dr, R2.dr) + misform_a = TensorProduct(R2.dr, R2.dr) + R2.dr + misform_b = R2.dr**4 + misform_c = R2.dx*R2.dy + twoform_not_sym = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dx, R2.dy) + twoform_not_TP = WedgeProduct(R2.dx, R2.dy) + + one_vector = R2.e_x + R2.e_y + two_vector = TensorProduct(R2.e_x, R2.e_y) + three_vector = TensorProduct(R2.e_x, R2.e_y, R2.e_x) + two_wp = WedgeProduct(R2.e_x,R2.e_y) + + assert covariant_order(one_form) == 1 + assert covariant_order(two_form) == 2 + assert covariant_order(three_form) == 3 + assert covariant_order(two_form + metric) == 2 + assert covariant_order(two_form + metric_ambig) == 2 + assert covariant_order(two_form + twoform_not_sym) == 2 + assert covariant_order(two_form + twoform_not_TP) == 2 + + assert contravariant_order(one_vector) == 1 + assert contravariant_order(two_vector) == 2 + assert contravariant_order(three_vector) == 3 + assert contravariant_order(two_vector + two_wp) == 2 + + raises(ValueError, lambda: covariant_order(misform_a)) + raises(ValueError, lambda: covariant_order(misform_b)) + raises(ValueError, lambda: covariant_order(misform_c)) + + assert twoform_to_matrix(metric) == Matrix([[1, 0], [0, 1]]) + assert twoform_to_matrix(twoform_not_sym) == Matrix([[1, 0], [1, 0]]) + assert twoform_to_matrix(twoform_not_TP) == Matrix([[0, -1], [1, 0]]) + + raises(ValueError, lambda: twoform_to_matrix(one_form)) + raises(ValueError, lambda: twoform_to_matrix(three_form)) + raises(ValueError, lambda: twoform_to_matrix(metric_ambig)) + + raises(ValueError, lambda: metric_to_Christoffel_1st(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Christoffel_2nd(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Riemann_components(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Ricci_components(twoform_not_sym)) + + +def test_correct_arguments(): + raises(ValueError, lambda: R2.e_x(R2.e_x)) + raises(ValueError, lambda: R2.e_x(R2.dx)) + + raises(ValueError, lambda: Commutator(R2.e_x, R2.x)) + raises(ValueError, lambda: Commutator(R2.dx, R2.e_x)) + + raises(ValueError, lambda: Differential(Differential(R2.e_x))) + + raises(ValueError, lambda: R2.dx(R2.x)) + + raises(ValueError, lambda: LieDerivative(R2.dx, R2.dx)) + raises(ValueError, lambda: LieDerivative(R2.x, R2.dx)) + + raises(ValueError, lambda: CovarDerivativeOp(R2.dx, [])) + raises(ValueError, lambda: CovarDerivativeOp(R2.x, [])) + + a = Symbol('a') + raises(ValueError, lambda: intcurve_series(R2.dx, a, R2_r.point([1, 2]))) + raises(ValueError, lambda: intcurve_series(R2.x, a, R2_r.point([1, 2]))) + + raises(ValueError, lambda: intcurve_diffequ(R2.dx, a, R2_r.point([1, 2]))) + raises(ValueError, lambda: intcurve_diffequ(R2.x, a, R2_r.point([1, 2]))) + + raises(ValueError, lambda: contravariant_order(R2.e_x + R2.dx)) + raises(ValueError, lambda: covariant_order(R2.e_x + R2.dx)) + + raises(ValueError, lambda: contravariant_order(R2.e_x*R2.e_y)) + raises(ValueError, lambda: covariant_order(R2.dx*R2.dy)) + +def test_simplify(): + x, y = R2_r.coord_functions() + dx, dy = R2_r.base_oneforms() + ex, ey = R2_r.base_vectors() + assert simplify(x) == x + assert simplify(x*y) == x*y + assert simplify(dx*dy) == dx*dy + assert simplify(ex*ey) == ex*ey + assert ((1-x)*dx)/(1-x)**2 == dx/(1-x) + + +def test_issue_17917(): + X = R2.x*R2.e_x - R2.y*R2.e_y + Y = (R2.x**2 + R2.y**2)*R2.e_x - R2.x*R2.y*R2.e_y + assert LieDerivative(X, Y).expand() == ( + R2.x**2*R2.e_x - 3*R2.y**2*R2.e_x - R2.x*R2.y*R2.e_y) + +def test_deprecations(): + m = Manifold('M', 2) + p = Patch('P', m) + with warns_deprecated_sympy(): + CoordSystem('Car2d', p, names=['x', 'y']) + + with warns_deprecated_sympy(): + c = CoordSystem('Car2d', p, ['x', 'y']) + + with warns_deprecated_sympy(): + list(m.patches) + + with warns_deprecated_sympy(): + list(c.transforms) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py new file mode 100644 index 0000000000000000000000000000000000000000..44d9623bc34ab73c7d575d9d9fd5b6d84f8e4a94 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py @@ -0,0 +1,145 @@ +from sympy.diffgeom.rn import R2, R2_p, R2_r, R3_r +from sympy.diffgeom import intcurve_series, Differential, WedgeProduct +from sympy.core import symbols, Function, Derivative +from sympy.simplify import trigsimp, simplify +from sympy.functions import sqrt, atan2, sin, cos +from sympy.matrices import Matrix + +# Most of the functionality is covered in the +# test_functional_diffgeom_ch* tests which are based on the +# example from the paper of Sussman and Wisdom. +# If they do not cover something, additional tests are added in other test +# functions. + +# From "Functional Differential Geometry" as of 2011 +# by Sussman and Wisdom. + + +def test_functional_diffgeom_ch2(): + x0, y0, r0, theta0 = symbols('x0, y0, r0, theta0', real=True) + x, y = symbols('x, y', real=True) + f = Function('f') + + assert (R2_p.point_to_coords(R2_r.point([x0, y0])) == + Matrix([sqrt(x0**2 + y0**2), atan2(y0, x0)])) + assert (R2_r.point_to_coords(R2_p.point([r0, theta0])) == + Matrix([r0*cos(theta0), r0*sin(theta0)])) + + assert R2_p.jacobian(R2_r, [r0, theta0]) == Matrix( + [[cos(theta0), -r0*sin(theta0)], [sin(theta0), r0*cos(theta0)]]) + + field = f(R2.x, R2.y) + p1_in_rect = R2_r.point([x0, y0]) + p1_in_polar = R2_p.point([sqrt(x0**2 + y0**2), atan2(y0, x0)]) + assert field.rcall(p1_in_rect) == f(x0, y0) + assert field.rcall(p1_in_polar) == f(x0, y0) + + p_r = R2_r.point([x0, y0]) + p_p = R2_p.point([r0, theta0]) + assert R2.x(p_r) == x0 + assert R2.x(p_p) == r0*cos(theta0) + assert R2.r(p_p) == r0 + assert R2.r(p_r) == sqrt(x0**2 + y0**2) + assert R2.theta(p_r) == atan2(y0, x0) + + h = R2.x*R2.r**2 + R2.y**3 + assert h.rcall(p_r) == x0*(x0**2 + y0**2) + y0**3 + assert h.rcall(p_p) == r0**3*sin(theta0)**3 + r0**3*cos(theta0) + + +def test_functional_diffgeom_ch3(): + x0, y0 = symbols('x0, y0', real=True) + x, y, t = symbols('x, y, t', real=True) + f = Function('f') + b1 = Function('b1') + b2 = Function('b2') + p_r = R2_r.point([x0, y0]) + + s_field = f(R2.x, R2.y) + v_field = b1(R2.x)*R2.e_x + b2(R2.y)*R2.e_y + assert v_field.rcall(s_field).rcall(p_r).doit() == b1( + x0)*Derivative(f(x0, y0), x0) + b2(y0)*Derivative(f(x0, y0), y0) + + assert R2.e_x(R2.r**2).rcall(p_r) == 2*x0 + v = R2.e_x + 2*R2.e_y + s = R2.r**2 + 3*R2.x + assert v.rcall(s).rcall(p_r).doit() == 2*x0 + 4*y0 + 3 + + circ = -R2.y*R2.e_x + R2.x*R2.e_y + series = intcurve_series(circ, t, R2_r.point([1, 0]), coeffs=True) + series_x, series_y = zip(*series) + assert all( + term == cos(t).taylor_term(i, t) for i, term in enumerate(series_x)) + assert all( + term == sin(t).taylor_term(i, t) for i, term in enumerate(series_y)) + + +def test_functional_diffgeom_ch4(): + x0, y0, theta0 = symbols('x0, y0, theta0', real=True) + x, y, r, theta = symbols('x, y, r, theta', real=True) + r0 = symbols('r0', positive=True) + f = Function('f') + b1 = Function('b1') + b2 = Function('b2') + p_r = R2_r.point([x0, y0]) + p_p = R2_p.point([r0, theta0]) + + f_field = b1(R2.x, R2.y)*R2.dx + b2(R2.x, R2.y)*R2.dy + assert f_field.rcall(R2.e_x).rcall(p_r) == b1(x0, y0) + assert f_field.rcall(R2.e_y).rcall(p_r) == b2(x0, y0) + + s_field_r = f(R2.x, R2.y) + df = Differential(s_field_r) + assert df(R2.e_x).rcall(p_r).doit() == Derivative(f(x0, y0), x0) + assert df(R2.e_y).rcall(p_r).doit() == Derivative(f(x0, y0), y0) + + s_field_p = f(R2.r, R2.theta) + df = Differential(s_field_p) + assert trigsimp(df(R2.e_x).rcall(p_p).doit()) == ( + cos(theta0)*Derivative(f(r0, theta0), r0) - + sin(theta0)*Derivative(f(r0, theta0), theta0)/r0) + assert trigsimp(df(R2.e_y).rcall(p_p).doit()) == ( + sin(theta0)*Derivative(f(r0, theta0), r0) + + cos(theta0)*Derivative(f(r0, theta0), theta0)/r0) + + assert R2.dx(R2.e_x).rcall(p_r) == 1 + assert R2.dx(R2.e_x) == 1 + assert R2.dx(R2.e_y).rcall(p_r) == 0 + assert R2.dx(R2.e_y) == 0 + + circ = -R2.y*R2.e_x + R2.x*R2.e_y + assert R2.dx(circ).rcall(p_r).doit() == -y0 + assert R2.dy(circ).rcall(p_r) == x0 + assert R2.dr(circ).rcall(p_r) == 0 + assert simplify(R2.dtheta(circ).rcall(p_r)) == 1 + + assert (circ - R2.e_theta).rcall(s_field_r).rcall(p_r) == 0 + + +def test_functional_diffgeom_ch6(): + u0, u1, u2, v0, v1, v2, w0, w1, w2 = symbols('u0:3, v0:3, w0:3', real=True) + + u = u0*R2.e_x + u1*R2.e_y + v = v0*R2.e_x + v1*R2.e_y + wp = WedgeProduct(R2.dx, R2.dy) + assert wp(u, v) == u0*v1 - u1*v0 + + u = u0*R3_r.e_x + u1*R3_r.e_y + u2*R3_r.e_z + v = v0*R3_r.e_x + v1*R3_r.e_y + v2*R3_r.e_z + w = w0*R3_r.e_x + w1*R3_r.e_y + w2*R3_r.e_z + wp = WedgeProduct(R3_r.dx, R3_r.dy, R3_r.dz) + assert wp( + u, v, w) == Matrix(3, 3, [u0, u1, u2, v0, v1, v2, w0, w1, w2]).det() + + a, b, c = symbols('a, b, c', cls=Function) + a_f = a(R3_r.x, R3_r.y, R3_r.z) + b_f = b(R3_r.x, R3_r.y, R3_r.z) + c_f = c(R3_r.x, R3_r.y, R3_r.z) + theta = a_f*R3_r.dx + b_f*R3_r.dy + c_f*R3_r.dz + dtheta = Differential(theta) + da = Differential(a_f) + db = Differential(b_f) + dc = Differential(c_f) + expr = dtheta - WedgeProduct( + da, R3_r.dx) - WedgeProduct(db, R3_r.dy) - WedgeProduct(dc, R3_r.dz) + assert expr.rcall(R3_r.e_x, R3_r.e_y) == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py new file mode 100644 index 0000000000000000000000000000000000000000..48ddc7f8065f2b69bcd8eca4726a21c5901514ec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py @@ -0,0 +1,91 @@ +r''' +unit test describing the hyperbolic half-plane with the Poincare metric. This +is a basic model of hyperbolic geometry on the (positive) half-space + +{(x,y) \in R^2 | y > 0} + +with the Riemannian metric + +ds^2 = (dx^2 + dy^2)/y^2 + +It has constant negative scalar curvature = -2 + +https://en.wikipedia.org/wiki/Poincare_half-plane_model +''' +from sympy.matrices.dense import diag +from sympy.diffgeom import (twoform_to_matrix, + metric_to_Christoffel_1st, metric_to_Christoffel_2nd, + metric_to_Riemann_components, metric_to_Ricci_components) +import sympy.diffgeom.rn +from sympy.tensor.array import ImmutableDenseNDimArray + + +def test_H2(): + TP = sympy.diffgeom.TensorProduct + R2 = sympy.diffgeom.rn.R2 + y = R2.y + dy = R2.dy + dx = R2.dx + g = (TP(dx, dx) + TP(dy, dy))*y**(-2) + automat = twoform_to_matrix(g) + mat = diag(y**(-2), y**(-2)) + assert mat == automat + + gamma1 = metric_to_Christoffel_1st(g) + assert gamma1[0, 0, 0] == 0 + assert gamma1[0, 0, 1] == -y**(-3) + assert gamma1[0, 1, 0] == -y**(-3) + assert gamma1[0, 1, 1] == 0 + + assert gamma1[1, 1, 1] == -y**(-3) + assert gamma1[1, 1, 0] == 0 + assert gamma1[1, 0, 1] == 0 + assert gamma1[1, 0, 0] == y**(-3) + + gamma2 = metric_to_Christoffel_2nd(g) + assert gamma2[0, 0, 0] == 0 + assert gamma2[0, 0, 1] == -y**(-1) + assert gamma2[0, 1, 0] == -y**(-1) + assert gamma2[0, 1, 1] == 0 + + assert gamma2[1, 1, 1] == -y**(-1) + assert gamma2[1, 1, 0] == 0 + assert gamma2[1, 0, 1] == 0 + assert gamma2[1, 0, 0] == y**(-1) + + Rm = metric_to_Riemann_components(g) + assert Rm[0, 0, 0, 0] == 0 + assert Rm[0, 0, 0, 1] == 0 + assert Rm[0, 0, 1, 0] == 0 + assert Rm[0, 0, 1, 1] == 0 + + assert Rm[0, 1, 0, 0] == 0 + assert Rm[0, 1, 0, 1] == -y**(-2) + assert Rm[0, 1, 1, 0] == y**(-2) + assert Rm[0, 1, 1, 1] == 0 + + assert Rm[1, 0, 0, 0] == 0 + assert Rm[1, 0, 0, 1] == y**(-2) + assert Rm[1, 0, 1, 0] == -y**(-2) + assert Rm[1, 0, 1, 1] == 0 + + assert Rm[1, 1, 0, 0] == 0 + assert Rm[1, 1, 0, 1] == 0 + assert Rm[1, 1, 1, 0] == 0 + assert Rm[1, 1, 1, 1] == 0 + + Ric = metric_to_Ricci_components(g) + assert Ric[0, 0] == -y**(-2) + assert Ric[0, 1] == 0 + assert Ric[1, 0] == 0 + assert Ric[0, 0] == -y**(-2) + + assert Ric == ImmutableDenseNDimArray([-y**(-2), 0, 0, -y**(-2)], (2, 2)) + + ## scalar curvature is -2 + #TODO - it would be nice to have index contraction built-in + R = (Ric[0, 0] + Ric[1, 1])*y**2 + assert R == -2 + + ## Gauss curvature is -1 + assert R/2 == -1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..968c4caa0d4562b71285f414bfb70f43d0b35111 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__init__.py @@ -0,0 +1,20 @@ +"""This module contains functions which operate on discrete sequences. + +Transforms - ``fft``, ``ifft``, ``ntt``, ``intt``, ``fwht``, ``ifwht``, + ``mobius_transform``, ``inverse_mobius_transform`` + +Convolutions - ``convolution``, ``convolution_fft``, ``convolution_ntt``, + ``convolution_fwht``, ``convolution_subset``, + ``covering_product``, ``intersecting_product`` +""" + +from .transforms import (fft, ifft, ntt, intt, fwht, ifwht, + mobius_transform, inverse_mobius_transform) +from .convolutions import convolution, covering_product, intersecting_product + +__all__ = [ + 'fft', 'ifft', 'ntt', 'intt', 'fwht', 'ifwht', 'mobius_transform', + 'inverse_mobius_transform', + + 'convolution', 'covering_product', 'intersecting_product', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..50107b08df9f1d7c92615f169211ad781069d653 Binary files /dev/null and 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b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/__pycache__/transforms.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/convolutions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/convolutions.py new file mode 100644 index 0000000000000000000000000000000000000000..ac9a3dbbb26b8b117ea1ee99cf7ebabbd21322cc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/convolutions.py @@ -0,0 +1,597 @@ +""" +Convolution (using **FFT**, **NTT**, **FWHT**), Subset Convolution, +Covering Product, Intersecting Product +""" + +from sympy.core import S, sympify, Rational +from sympy.core.function import expand_mul +from sympy.discrete.transforms import ( + fft, ifft, ntt, intt, fwht, ifwht, + mobius_transform, inverse_mobius_transform) +from sympy.external.gmpy import MPZ, lcm +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +def convolution(a, b, cycle=0, dps=None, prime=None, dyadic=None, subset=None): + """ + Performs convolution by determining the type of desired + convolution using hints. + + Exactly one of ``dps``, ``prime``, ``dyadic``, ``subset`` arguments + should be specified explicitly for identifying the type of convolution, + and the argument ``cycle`` can be specified optionally. + + For the default arguments, linear convolution is performed using **FFT**. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + cycle : Integer + Specifies the length for doing cyclic convolution. + dps : Integer + Specifies the number of decimal digits for precision for + performing **FFT** on the sequence. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for + performing **NTT** on the sequence. + dyadic : bool + Identifies the convolution type as dyadic (*bitwise-XOR*) + convolution, which is performed using **FWHT**. + subset : bool + Identifies the convolution type as subset convolution. + + Examples + ======== + + >>> from sympy import convolution, symbols, S, I + >>> u, v, w, x, y, z = symbols('u v w x y z') + + >>> convolution([1 + 2*I, 4 + 3*I], [S(5)/4, 6], dps=3) + [1.25 + 2.5*I, 11.0 + 15.8*I, 24.0 + 18.0*I] + >>> convolution([1, 2, 3], [4, 5, 6], cycle=3) + [31, 31, 28] + + >>> convolution([111, 777], [888, 444], prime=19*2**10 + 1) + [1283, 19351, 14219] + >>> convolution([111, 777], [888, 444], prime=19*2**10 + 1, cycle=2) + [15502, 19351] + + >>> convolution([u, v], [x, y, z], dyadic=True) + [u*x + v*y, u*y + v*x, u*z, v*z] + >>> convolution([u, v], [x, y, z], dyadic=True, cycle=2) + [u*x + u*z + v*y, u*y + v*x + v*z] + + >>> convolution([u, v, w], [x, y, z], subset=True) + [u*x, u*y + v*x, u*z + w*x, v*z + w*y] + >>> convolution([u, v, w], [x, y, z], subset=True, cycle=3) + [u*x + v*z + w*y, u*y + v*x, u*z + w*x] + + """ + + c = as_int(cycle) + if c < 0: + raise ValueError("The length for cyclic convolution " + "must be non-negative") + + dyadic = True if dyadic else None + subset = True if subset else None + if sum(x is not None for x in (prime, dps, dyadic, subset)) > 1: + raise TypeError("Ambiguity in determining the type of convolution") + + if prime is not None: + ls = convolution_ntt(a, b, prime=prime) + return ls if not c else [sum(ls[i::c]) % prime for i in range(c)] + + if dyadic: + ls = convolution_fwht(a, b) + elif subset: + ls = convolution_subset(a, b) + else: + def loop(a): + dens = [] + for i in a: + if isinstance(i, Rational) and i.q - 1: + dens.append(i.q) + elif not isinstance(i, int): + return + if dens: + l = lcm(*dens) + return [i*l if type(i) is int else i.p*(l//i.q) for i in a], l + # no lcm of den to deal with + return a, 1 + ls = None + da = loop(a) + if da is not None: + db = loop(b) + if db is not None: + (ia, ma), (ib, mb) = da, db + den = ma*mb + ls = convolution_int(ia, ib) + if den != 1: + ls = [Rational(i, den) for i in ls] + if ls is None: + ls = convolution_fft(a, b, dps) + + return ls if not c else [sum(ls[i::c]) for i in range(c)] + + +#----------------------------------------------------------------------------# +# # +# Convolution for Complex domain # +# # +#----------------------------------------------------------------------------# + +def convolution_fft(a, b, dps=None): + """ + Performs linear convolution using Fast Fourier Transform. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + dps : Integer + Specifies the number of decimal digits for precision. + + Examples + ======== + + >>> from sympy import S, I + >>> from sympy.discrete.convolutions import convolution_fft + + >>> convolution_fft([2, 3], [4, 5]) + [8, 22, 15] + >>> convolution_fft([2, 5], [6, 7, 3]) + [12, 44, 41, 15] + >>> convolution_fft([1 + 2*I, 4 + 3*I], [S(5)/4, 6]) + [5/4 + 5*I/2, 11 + 63*I/4, 24 + 18*I] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Convolution_theorem + .. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + a, b = a[:], b[:] + n = m = len(a) + len(b) - 1 # convolution size + + if n > 0 and n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = fft(a, dps), fft(b, dps) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = ifft(a, dps)[:m] + + return a + + +#----------------------------------------------------------------------------# +# # +# Convolution for GF(p) # +# # +#----------------------------------------------------------------------------# + +def convolution_ntt(a, b, prime): + """ + Performs linear convolution using Number Theoretic Transform. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for performing + **NTT** on the sequence. + + Examples + ======== + + >>> from sympy.discrete.convolutions import convolution_ntt + >>> convolution_ntt([2, 3], [4, 5], prime=19*2**10 + 1) + [8, 22, 15] + >>> convolution_ntt([2, 5], [6, 7, 3], prime=19*2**10 + 1) + [12, 44, 41, 15] + >>> convolution_ntt([333, 555], [222, 666], prime=19*2**10 + 1) + [15555, 14219, 19404] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Convolution_theorem + .. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + a, b, p = a[:], b[:], as_int(prime) + n = m = len(a) + len(b) - 1 # convolution size + + if n > 0 and n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [0]*(n - len(a)) + b += [0]*(n - len(b)) + + a, b = ntt(a, p), ntt(b, p) + a = [x*y % p for x, y in zip(a, b)] + a = intt(a, p)[:m] + + return a + + +#----------------------------------------------------------------------------# +# # +# Convolution for 2**n-group # +# # +#----------------------------------------------------------------------------# + +def convolution_fwht(a, b): + """ + Performs dyadic (*bitwise-XOR*) convolution using Fast Walsh Hadamard + Transform. + + The convolution is automatically padded to the right with zeros, as the + *radix-2 FWHT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + + Examples + ======== + + >>> from sympy import symbols, S, I + >>> from sympy.discrete.convolutions import convolution_fwht + + >>> u, v, x, y = symbols('u v x y') + >>> convolution_fwht([u, v], [x, y]) + [u*x + v*y, u*y + v*x] + + >>> convolution_fwht([2, 3], [4, 5]) + [23, 22] + >>> convolution_fwht([2, 5 + 4*I, 7], [6*I, 7, 3 + 4*I]) + [56 + 68*I, -10 + 30*I, 6 + 50*I, 48 + 32*I] + + >>> convolution_fwht([S(33)/7, S(55)/6, S(7)/4], [S(2)/3, 5]) + [2057/42, 1870/63, 7/6, 35/4] + + References + ========== + + .. [1] https://www.radioeng.cz/fulltexts/2002/02_03_40_42.pdf + .. [2] https://en.wikipedia.org/wiki/Hadamard_transform + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = fwht(a), fwht(b) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = ifwht(a) + + return a + + +#----------------------------------------------------------------------------# +# # +# Subset Convolution # +# # +#----------------------------------------------------------------------------# + +def convolution_subset(a, b): + """ + Performs Subset Convolution of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + + Examples + ======== + + >>> from sympy import symbols, S + >>> from sympy.discrete.convolutions import convolution_subset + >>> u, v, x, y, z = symbols('u v x y z') + + >>> convolution_subset([u, v], [x, y]) + [u*x, u*y + v*x] + >>> convolution_subset([u, v, x], [y, z]) + [u*y, u*z + v*y, x*y, x*z] + + >>> convolution_subset([1, S(2)/3], [3, 4]) + [3, 6] + >>> convolution_subset([1, 3, S(5)/7], [7]) + [7, 21, 5, 0] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + if not iterable(a) or not iterable(b): + raise TypeError("Expected a sequence of coefficients for convolution") + + a = [sympify(arg) for arg in a] + b = [sympify(arg) for arg in b] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + c = [S.Zero]*n + + for mask in range(n): + smask = mask + while smask > 0: + c[mask] += expand_mul(a[smask] * b[mask^smask]) + smask = (smask - 1)&mask + + c[mask] += expand_mul(a[smask] * b[mask^smask]) + + return c + + +#----------------------------------------------------------------------------# +# # +# Covering Product # +# # +#----------------------------------------------------------------------------# + +def covering_product(a, b): + """ + Returns the covering product of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The covering product of given sequences is a sequence which contains + the sum of products of the elements of the given sequences grouped by + the *bitwise-OR* of the corresponding indices. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which covering product is to be obtained. + + Examples + ======== + + >>> from sympy import symbols, S, I, covering_product + >>> u, v, x, y, z = symbols('u v x y z') + + >>> covering_product([u, v], [x, y]) + [u*x, u*y + v*x + v*y] + >>> covering_product([u, v, x], [y, z]) + [u*y, u*z + v*y + v*z, x*y, x*z] + + >>> covering_product([1, S(2)/3], [3, 4 + 5*I]) + [3, 26/3 + 25*I/3] + >>> covering_product([1, 3, S(5)/7], [7, 8]) + [7, 53, 5, 40/7] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = mobius_transform(a), mobius_transform(b) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = inverse_mobius_transform(a) + + return a + + +#----------------------------------------------------------------------------# +# # +# Intersecting Product # +# # +#----------------------------------------------------------------------------# + +def intersecting_product(a, b): + """ + Returns the intersecting product of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The intersecting product of given sequences is the sequence which + contains the sum of products of the elements of the given sequences + grouped by the *bitwise-AND* of the corresponding indices. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which intersecting product is to be obtained. + + Examples + ======== + + >>> from sympy import symbols, S, I, intersecting_product + >>> u, v, x, y, z = symbols('u v x y z') + + >>> intersecting_product([u, v], [x, y]) + [u*x + u*y + v*x, v*y] + >>> intersecting_product([u, v, x], [y, z]) + [u*y + u*z + v*y + x*y + x*z, v*z, 0, 0] + + >>> intersecting_product([1, S(2)/3], [3, 4 + 5*I]) + [9 + 5*I, 8/3 + 10*I/3] + >>> intersecting_product([1, 3, S(5)/7], [7, 8]) + [327/7, 24, 0, 0] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = mobius_transform(a, subset=False), mobius_transform(b, subset=False) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = inverse_mobius_transform(a, subset=False) + + return a + + +#----------------------------------------------------------------------------# +# # +# Integer Convolutions # +# # +#----------------------------------------------------------------------------# + +def convolution_int(a, b): + """Return the convolution of two sequences as a list. + + The iterables must consist solely of integers. + + Parameters + ========== + + a, b : Sequence + The sequences for which convolution is performed. + + Explanation + =========== + + This function performs the convolution of ``a`` and ``b`` by packing + each into a single integer, multiplying them together, and then + unpacking the result from the product. The intuition behind this is + that if we evaluate some polynomial [1]: + + .. math :: + 1156x^6 + 3808x^5 + 8440x^4 + 14856x^3 + 16164x^2 + 14040x + 8100 + + at say $x = 10^5$ we obtain $1156038080844014856161641404008100$. + Note we can read of the coefficients for each term every five digits. + If the $x$ we chose to evaluate at is large enough, the same will hold + for the product. + + The idea now is since big integer multiplication in libraries such + as GMP is highly optimised, this will be reasonably fast. + + Examples + ======== + + >>> from sympy.discrete.convolutions import convolution_int + + >>> convolution_int([2, 3], [4, 5]) + [8, 22, 15] + >>> convolution_int([1, 1, -1], [1, 1]) + [1, 2, 0, -1] + + References + ========== + + .. [1] Fateman, Richard J. + Can you save time in multiplying polynomials by encoding them as integers? + University of California, Berkeley, California (2004). + https://people.eecs.berkeley.edu/~fateman/papers/polysbyGMP.pdf + """ + # An upper bound on the largest coefficient in p(x)q(x) is given by (1 + min(dp, dq))N(p)N(q) + # where dp = deg(p), dq = deg(q), N(f) denotes the coefficient of largest modulus in f [1] + B = max(abs(c) for c in a)*max(abs(c) for c in b)*(1 + min(len(a) - 1, len(b) - 1)) + x, power = MPZ(1), 0 + while x <= (2*B): # multiply by two for negative coefficients, see [1] + x <<= 1 + power += 1 + + def to_integer(poly): + n, mul = MPZ(0), 0 + for c in reversed(poly): + if c and not mul: mul = -1 if c < 0 else 1 + n <<= power + n += mul*int(c) + return mul, n + + # Perform packing and multiplication + (a_mul, a_packed), (b_mul, b_packed) = to_integer(a), to_integer(b) + result = a_packed * b_packed + + # Perform unpacking + mul = a_mul * b_mul + mask, half, borrow, poly = x - 1, x >> 1, 0, [] + while result or borrow: + coeff = (result & mask) + borrow + result >>= power + borrow = coeff >= half + poly.append(mul * int(coeff if coeff < half else coeff - x)) + return poly or [0] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/recurrences.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/recurrences.py new file mode 100644 index 0000000000000000000000000000000000000000..0b0ed80d304161cf9ca298321aedc094c8cae1b3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/recurrences.py @@ -0,0 +1,166 @@ +""" +Recurrences +""" + +from sympy.core import S, sympify +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +def linrec(coeffs, init, n): + r""" + Evaluation of univariate linear recurrences of homogeneous type + having coefficients independent of the recurrence variable. + + Parameters + ========== + + coeffs : iterable + Coefficients of the recurrence + init : iterable + Initial values of the recurrence + n : Integer + Point of evaluation for the recurrence + + Notes + ===== + + Let `y(n)` be the recurrence of given type, ``c`` be the sequence + of coefficients, ``b`` be the sequence of initial/base values of the + recurrence and ``k`` (equal to ``len(c)``) be the order of recurrence. + Then, + + .. math :: y(n) = \begin{cases} b_n & 0 \le n < k \\ + c_0 y(n-1) + c_1 y(n-2) + \cdots + c_{k-1} y(n-k) & n \ge k + \end{cases} + + Let `x_0, x_1, \ldots, x_n` be a sequence and consider the transformation + that maps each polynomial `f(x)` to `T(f(x))` where each power `x^i` is + replaced by the corresponding value `x_i`. The sequence is then a solution + of the recurrence if and only if `T(x^i p(x)) = 0` for each `i \ge 0` where + `p(x) = x^k - c_0 x^(k-1) - \cdots - c_{k-1}` is the characteristic + polynomial. + + Then `T(f(x)p(x)) = 0` for each polynomial `f(x)` (as it is a linear + combination of powers `x^i`). Now, if `x^n` is congruent to + `g(x) = a_0 x^0 + a_1 x^1 + \cdots + a_{k-1} x^{k-1}` modulo `p(x)`, then + `T(x^n) = x_n` is equal to + `T(g(x)) = a_0 x_0 + a_1 x_1 + \cdots + a_{k-1} x_{k-1}`. + + Computation of `x^n`, + given `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}` + is performed using exponentiation by squaring (refer to [1_]) with + an additional reduction step performed to retain only first `k` powers + of `x` in the representation of `x^n`. + + Examples + ======== + + >>> from sympy.discrete.recurrences import linrec + >>> from sympy.abc import x, y, z + + >>> linrec(coeffs=[1, 1], init=[0, 1], n=10) + 55 + + >>> linrec(coeffs=[1, 1], init=[x, y], n=10) + 34*x + 55*y + + >>> linrec(coeffs=[x, y], init=[0, 1], n=5) + x**2*y + x*(x**3 + 2*x*y) + y**2 + + >>> linrec(coeffs=[1, 2, 3, 0, 0, 4], init=[x, y, z], n=16) + 13576*x + 5676*y + 2356*z + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Exponentiation_by_squaring + .. [2] https://en.wikipedia.org/w/index.php?title=Modular_exponentiation§ion=6#Matrices + + See Also + ======== + + sympy.polys.agca.extensions.ExtensionElement.__pow__ + + """ + + if not coeffs: + return S.Zero + + if not iterable(coeffs): + raise TypeError("Expected a sequence of coefficients for" + " the recurrence") + + if not iterable(init): + raise TypeError("Expected a sequence of values for the initialization" + " of the recurrence") + + n = as_int(n) + if n < 0: + raise ValueError("Point of evaluation of recurrence must be a " + "non-negative integer") + + c = [sympify(arg) for arg in coeffs] + b = [sympify(arg) for arg in init] + k = len(c) + + if len(b) > k: + raise TypeError("Count of initial values should not exceed the " + "order of the recurrence") + else: + b += [S.Zero]*(k - len(b)) # remaining initial values default to zero + + if n < k: + return b[n] + terms = [u*v for u, v in zip(linrec_coeffs(c, n), b)] + return sum(terms[:-1], terms[-1]) + + +def linrec_coeffs(c, n): + r""" + Compute the coefficients of n'th term in linear recursion + sequence defined by c. + + `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}`. + + It computes the coefficients by using binary exponentiation. + This function is used by `linrec` and `_eval_pow_by_cayley`. + + Parameters + ========== + + c = coefficients of the divisor polynomial + n = exponent of x, so dividend is x^n + + """ + + k = len(c) + + def _square_and_reduce(u, offset): + # squares `(u_0 + u_1 x + u_2 x^2 + \cdots + u_{k-1} x^k)` (and + # multiplies by `x` if offset is 1) and reduces the above result of + # length upto `2k` to `k` using the characteristic equation of the + # recurrence given by, `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}` + + w = [S.Zero]*(2*len(u) - 1 + offset) + for i, p in enumerate(u): + for j, q in enumerate(u): + w[offset + i + j] += p*q + + for j in range(len(w) - 1, k - 1, -1): + for i in range(k): + w[j - i - 1] += w[j]*c[i] + + return w[:k] + + def _final_coeffs(n): + # computes the final coefficient list - `cf` corresponding to the + # point at which recurrence is to be evalauted - `n`, such that, + # `y(n) = cf_0 y(k-1) + cf_1 y(k-2) + \cdots + cf_{k-1} y(0)` + + if n < k: + return [S.Zero]*n + [S.One] + [S.Zero]*(k - n - 1) + else: + return _square_and_reduce(_final_coeffs(n // 2), n % 2) + + return _final_coeffs(n) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py new file mode 100644 index 0000000000000000000000000000000000000000..96e5fc801ac63f95c01eb18d48143ae3a1ac6222 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py @@ -0,0 +1,392 @@ +from sympy.core.numbers import (E, Rational, pi) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.core import S, symbols, I +from sympy.discrete.convolutions import ( + convolution, convolution_fft, convolution_ntt, convolution_fwht, + convolution_subset, covering_product, intersecting_product, + convolution_int) +from sympy.testing.pytest import raises +from sympy.abc import x, y + +def test_convolution(): + # fft + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5)] + b = [9, 5, 5, 4, 3, 2] + c = [3, 5, 3, 7, 8] + d = [1422, 6572, 3213, 5552] + e = [-1, Rational(5, 3), Rational(7, 5)] + + assert convolution(a, b) == convolution_fft(a, b) + assert convolution(a, b, dps=9) == convolution_fft(a, b, dps=9) + assert convolution(a, d, dps=7) == convolution_fft(d, a, dps=7) + assert convolution(a, d[1:], dps=3) == convolution_fft(d[1:], a, dps=3) + + # prime moduli of the form (m*2**k + 1), sequence length + # should be a divisor of 2**k + p = 7*17*2**23 + 1 + q = 19*2**10 + 1 + + # ntt + assert convolution(d, b, prime=q) == convolution_ntt(b, d, prime=q) + assert convolution(c, b, prime=p) == convolution_ntt(b, c, prime=p) + assert convolution(d, c, prime=p) == convolution_ntt(c, d, prime=p) + raises(TypeError, lambda: convolution(b, d, dps=5, prime=q)) + raises(TypeError, lambda: convolution(b, d, dps=6, prime=q)) + + # fwht + assert convolution(a, b, dyadic=True) == convolution_fwht(a, b) + assert convolution(a, b, dyadic=False) == convolution(a, b) + raises(TypeError, lambda: convolution(b, d, dps=2, dyadic=True)) + raises(TypeError, lambda: convolution(b, d, prime=p, dyadic=True)) + raises(TypeError, lambda: convolution(a, b, dps=2, dyadic=True)) + raises(TypeError, lambda: convolution(b, c, prime=p, dyadic=True)) + + # subset + assert convolution(a, b, subset=True) == convolution_subset(a, b) == \ + convolution(a, b, subset=True, dyadic=False) == \ + convolution(a, b, subset=True) + assert convolution(a, b, subset=False) == convolution(a, b) + raises(TypeError, lambda: convolution(a, b, subset=True, dyadic=True)) + raises(TypeError, lambda: convolution(c, d, subset=True, dps=6)) + raises(TypeError, lambda: convolution(a, c, subset=True, prime=q)) + + # integer + assert convolution([0], [0]) == convolution_int([0], [0]) + assert convolution(b, c) == convolution_int(b, c) + + # rational + assert convolution([Rational(1,2)], [Rational(1,2)]) == [Rational(1, 4)] + assert convolution(b, e) == [-9, 10, Rational(239, 15), Rational(34, 3), + Rational(32, 3), Rational(43, 5), Rational(113, 15), + Rational(14, 5)] + + +def test_cyclic_convolution(): + # fft + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5)] + b = [9, 5, 5, 4, 3, 2] + + assert convolution([1, 2, 3], [4, 5, 6], cycle=0) == \ + convolution([1, 2, 3], [4, 5, 6], cycle=5) == \ + convolution([1, 2, 3], [4, 5, 6]) + + assert convolution([1, 2, 3], [4, 5, 6], cycle=3) == [31, 31, 28] + + a = [Rational(1, 3), Rational(7, 3), Rational(5, 9), Rational(2, 7), Rational(5, 8)] + b = [Rational(3, 5), Rational(4, 7), Rational(7, 8), Rational(8, 9)] + + assert convolution(a, b, cycle=0) == \ + convolution(a, b, cycle=len(a) + len(b) - 1) + + assert convolution(a, b, cycle=4) == [Rational(87277, 26460), Rational(30521, 11340), + Rational(11125, 4032), Rational(3653, 1080)] + + assert convolution(a, b, cycle=6) == [Rational(20177, 20160), Rational(676, 315), Rational(47, 24), + Rational(3053, 1080), Rational(16397, 5292), Rational(2497, 2268)] + + assert convolution(a, b, cycle=9) == \ + convolution(a, b, cycle=0) + [S.Zero] + + # ntt + a = [2313, 5323532, S(3232), 42142, 42242421] + b = [S(33456), 56757, 45754, 432423] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=0) == \ + convolution(a, b, prime=19*2**10 + 1, cycle=8) == \ + convolution(a, b, prime=19*2**10 + 1) + + assert convolution(a, b, prime=19*2**10 + 1, cycle=5) == [96, 17146, 2664, + 15534, 3517] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=7) == [4643, 3458, 1260, + 15534, 3517, 16314, 13688] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=9) == \ + convolution(a, b, prime=19*2**10 + 1) + [0] + + # fwht + u, v, w, x, y = symbols('u v w x y') + p, q, r, s, t = symbols('p q r s t') + c = [u, v, w, x, y] + d = [p, q, r, s, t] + + assert convolution(a, b, dyadic=True, cycle=3) == \ + [2499522285783, 19861417974796, 4702176579021] + + assert convolution(a, b, dyadic=True, cycle=5) == [2718149225143, + 2114320852171, 20571217906407, 246166418903, 1413262436976] + + assert convolution(c, d, dyadic=True, cycle=4) == \ + [p*u + p*y + q*v + r*w + s*x + t*u + t*y, + p*v + q*u + q*y + r*x + s*w + t*v, + p*w + q*x + r*u + r*y + s*v + t*w, + p*x + q*w + r*v + s*u + s*y + t*x] + + assert convolution(c, d, dyadic=True, cycle=6) == \ + [p*u + q*v + r*w + r*y + s*x + t*w + t*y, + p*v + q*u + r*x + s*w + s*y + t*x, + p*w + q*x + r*u + s*v, + p*x + q*w + r*v + s*u, + p*y + t*u, + q*y + t*v] + + # subset + assert convolution(a, b, subset=True, cycle=7) == [18266671799811, + 178235365533, 213958794, 246166418903, 1413262436976, + 2397553088697, 1932759730434] + + assert convolution(a[1:], b, subset=True, cycle=4) == \ + [178104086592, 302255835516, 244982785880, 3717819845434] + + assert convolution(a, b[:-1], subset=True, cycle=6) == [1932837114162, + 178235365533, 213958794, 245166224504, 1413262436976, 2397553088697] + + assert convolution(c, d, subset=True, cycle=3) == \ + [p*u + p*x + q*w + r*v + r*y + s*u + t*w, + p*v + p*y + q*u + s*y + t*u + t*x, + p*w + q*y + r*u + t*v] + + assert convolution(c, d, subset=True, cycle=5) == \ + [p*u + q*y + t*v, + p*v + q*u + r*y + t*w, + p*w + r*u + s*y + t*x, + p*x + q*w + r*v + s*u, + p*y + t*u] + + raises(ValueError, lambda: convolution([1, 2, 3], [4, 5, 6], cycle=-1)) + + +def test_convolution_fft(): + assert all(convolution_fft([], x, dps=y) == [] for x in ([], [1]) for y in (None, 3)) + assert convolution_fft([1, 2, 3], [4, 5, 6]) == [4, 13, 28, 27, 18] + assert convolution_fft([1], [5, 6, 7]) == [5, 6, 7] + assert convolution_fft([1, 3], [5, 6, 7]) == [5, 21, 25, 21] + + assert convolution_fft([1 + 2*I], [2 + 3*I]) == [-4 + 7*I] + assert convolution_fft([1 + 2*I, 3 + 4*I, 5 + 3*I/5], [Rational(2, 5) + 4*I/7]) == \ + [Rational(-26, 35) + I*48/35, Rational(-38, 35) + I*116/35, Rational(58, 35) + I*542/175] + + assert convolution_fft([Rational(3, 4), Rational(5, 6)], [Rational(7, 8), Rational(1, 3), Rational(2, 5)]) == \ + [Rational(21, 32), Rational(47, 48), Rational(26, 45), Rational(1, 3)] + + assert convolution_fft([Rational(1, 9), Rational(2, 3), Rational(3, 5)], [Rational(2, 5), Rational(3, 7), Rational(4, 9)]) == \ + [Rational(2, 45), Rational(11, 35), Rational(8152, 14175), Rational(523, 945), Rational(4, 15)] + + assert convolution_fft([pi, E, sqrt(2)], [sqrt(3), 1/pi, 1/E]) == \ + [sqrt(3)*pi, 1 + sqrt(3)*E, E/pi + pi*exp(-1) + sqrt(6), + sqrt(2)/pi + 1, sqrt(2)*exp(-1)] + + assert convolution_fft([2321, 33123], [5321, 6321, 71323]) == \ + [12350041, 190918524, 374911166, 2362431729] + + assert convolution_fft([312313, 31278232], [32139631, 319631]) == \ + [10037624576503, 1005370659728895, 9997492572392] + + raises(TypeError, lambda: convolution_fft(x, y)) + raises(ValueError, lambda: convolution_fft([x, y], [y, x])) + + +def test_convolution_ntt(): + # prime moduli of the form (m*2**k + 1), sequence length + # should be a divisor of 2**k + p = 7*17*2**23 + 1 + q = 19*2**10 + 1 + r = 2*500000003 + 1 # only for sequences of length 1 or 2 + # s = 2*3*5*7 # composite modulus + + assert all(convolution_ntt([], x, prime=y) == [] for x in ([], [1]) for y in (p, q, r)) + assert convolution_ntt([2], [3], r) == [6] + assert convolution_ntt([2, 3], [4], r) == [8, 12] + + assert convolution_ntt([32121, 42144, 4214, 4241], [32132, 3232, 87242], p) == [33867619, + 459741727, 79180879, 831885249, 381344700, 369993322] + assert convolution_ntt([121913, 3171831, 31888131, 12], [17882, 21292, 29921, 312], q) == \ + [8158, 3065, 3682, 7090, 1239, 2232, 3744] + + assert convolution_ntt([12, 19, 21, 98, 67], [2, 6, 7, 8, 9], p) == \ + convolution_ntt([12, 19, 21, 98, 67], [2, 6, 7, 8, 9], q) + assert convolution_ntt([12, 19, 21, 98, 67], [21, 76, 17, 78, 69], p) == \ + convolution_ntt([12, 19, 21, 98, 67], [21, 76, 17, 78, 69], q) + + raises(ValueError, lambda: convolution_ntt([2, 3], [4, 5], r)) + raises(ValueError, lambda: convolution_ntt([x, y], [y, x], q)) + raises(TypeError, lambda: convolution_ntt(x, y, p)) + + +def test_convolution_fwht(): + assert convolution_fwht([], []) == [] + assert convolution_fwht([], [1]) == [] + assert convolution_fwht([1, 2, 3], [4, 5, 6]) == [32, 13, 18, 27] + + assert convolution_fwht([Rational(5, 7), Rational(6, 8), Rational(7, 3)], [2, 4, Rational(6, 7)]) == \ + [Rational(45, 7), Rational(61, 14), Rational(776, 147), Rational(419, 42)] + + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5), 4 + 5*I] + b = [94, 51, 53, 45, 31, 27, 13] + c = [3 + 4*I, 5 + 7*I, 3, Rational(7, 6), 8] + + assert convolution_fwht(a, b) == [53*sqrt(3) + 366 + 155*I, + 45*sqrt(3) + Rational(5848, 15) + 135*I, + 94*sqrt(3) + Rational(1257, 5) + 65*I, + 51*sqrt(3) + Rational(3974, 15), + 13*sqrt(3) + 452 + 470*I, + Rational(4513, 15) + 255*I, + 31*sqrt(3) + Rational(1314, 5) + 265*I, + 27*sqrt(3) + Rational(3676, 15) + 225*I] + + assert convolution_fwht(b, c) == [Rational(1993, 2) + 733*I, Rational(6215, 6) + 862*I, + Rational(1659, 2) + 527*I, Rational(1988, 3) + 551*I, 1019 + 313*I, Rational(3955, 6) + 325*I, + Rational(1175, 2) + 52*I, Rational(3253, 6) + 91*I] + + assert convolution_fwht(a[3:], c) == [Rational(-54, 5) + I*293/5, -1 + I*204/5, + Rational(133, 15) + I*35/6, Rational(409, 30) + 15*I, Rational(56, 5), 32 + 40*I, 0, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert convolution_fwht([u, v], [x, y]) == [u*x + v*y, u*y + v*x] + + assert convolution_fwht([u, v, w], [x, y]) == \ + [u*x + v*y, u*y + v*x, w*x, w*y] + + assert convolution_fwht([u, v, w], [x, y, z]) == \ + [u*x + v*y + w*z, u*y + v*x, u*z + w*x, v*z + w*y] + + raises(TypeError, lambda: convolution_fwht(x, y)) + raises(TypeError, lambda: convolution_fwht(x*y, u + v)) + + +def test_convolution_subset(): + assert convolution_subset([], []) == [] + assert convolution_subset([], [Rational(1, 3)]) == [] + assert convolution_subset([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, Rational(5, 3), sqrt(3), 4 + 5*I] + b = [64, 71, 55, 47, 33, 29, 15] + c = [3 + I*2/3, 5 + 7*I, 7, Rational(7, 5), 9] + + assert convolution_subset(a, b) == [64, Rational(533, 3), 55 + 64*sqrt(3), + 71*sqrt(3) + Rational(1184, 3) + 320*I, 33, 84, + 15 + 33*sqrt(3), 29*sqrt(3) + 157 + 165*I] + + assert convolution_subset(b, c) == [192 + I*128/3, 533 + I*1486/3, + 613 + I*110/3, Rational(5013, 5) + I*1249/3, + 675 + 22*I, 891 + I*751/3, + 771 + 10*I, Rational(3736, 5) + 105*I] + + assert convolution_subset(a, c) == convolution_subset(c, a) + assert convolution_subset(a[:2], b) == \ + [64, Rational(533, 3), 55, Rational(416, 3), 33, 84, 15, 25] + + assert convolution_subset(a[:2], c) == \ + [3 + I*2/3, 10 + I*73/9, 7, Rational(196, 15), 9, 15, 0, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert convolution_subset([u, v, w], [x, y]) == [u*x, u*y + v*x, w*x, w*y] + assert convolution_subset([u, v, w, x], [y, z]) == \ + [u*y, u*z + v*y, w*y, w*z + x*y] + + assert convolution_subset([u, v], [x, y, z]) == \ + convolution_subset([x, y, z], [u, v]) + + raises(TypeError, lambda: convolution_subset(x, z)) + raises(TypeError, lambda: convolution_subset(Rational(7, 3), u)) + + +def test_covering_product(): + assert covering_product([], []) == [] + assert covering_product([], [Rational(1, 3)]) == [] + assert covering_product([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, Rational(5, 8), sqrt(7), 4 + 9*I] + b = [66, 81, 95, 49, 37, 89, 17] + c = [3 + I*2/3, 51 + 72*I, 7, Rational(7, 15), 91] + + assert covering_product(a, b) == [66, Rational(1383, 8), 95 + 161*sqrt(7), + 130*sqrt(7) + 1303 + 2619*I, 37, + Rational(671, 4), 17 + 54*sqrt(7), + 89*sqrt(7) + Rational(4661, 8) + 1287*I] + + assert covering_product(b, c) == [198 + 44*I, 7740 + 10638*I, + 1412 + I*190/3, Rational(42684, 5) + I*31202/3, + 9484 + I*74/3, 22163 + I*27394/3, + 10621 + I*34/3, Rational(90236, 15) + 1224*I] + + assert covering_product(a, c) == covering_product(c, a) + assert covering_product(b, c[:-1]) == [198 + 44*I, 7740 + 10638*I, + 1412 + I*190/3, Rational(42684, 5) + I*31202/3, + 111 + I*74/3, 6693 + I*27394/3, + 429 + I*34/3, Rational(23351, 15) + 1224*I] + + assert covering_product(a, c[:-1]) == [3 + I*2/3, + Rational(339, 4) + I*1409/12, 7 + 10*sqrt(7) + 2*sqrt(7)*I/3, + -403 + 772*sqrt(7)/15 + 72*sqrt(7)*I + I*12658/15] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert covering_product([u, v, w], [x, y]) == \ + [u*x, u*y + v*x + v*y, w*x, w*y] + + assert covering_product([u, v, w, x], [y, z]) == \ + [u*y, u*z + v*y + v*z, w*y, w*z + x*y + x*z] + + assert covering_product([u, v], [x, y, z]) == \ + covering_product([x, y, z], [u, v]) + + raises(TypeError, lambda: covering_product(x, z)) + raises(TypeError, lambda: covering_product(Rational(7, 3), u)) + + +def test_intersecting_product(): + assert intersecting_product([], []) == [] + assert intersecting_product([], [Rational(1, 3)]) == [] + assert intersecting_product([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, sqrt(5), Rational(3, 8) + 5*I, 4 + 7*I] + b = [67, 51, 65, 48, 36, 79, 27] + c = [3 + I*2/5, 5 + 9*I, 7, Rational(7, 19), 13] + + assert intersecting_product(a, b) == [195*sqrt(5) + Rational(6979, 8) + 1886*I, + 178*sqrt(5) + 520 + 910*I, Rational(841, 2) + 1344*I, + 192 + 336*I, 0, 0, 0, 0] + + assert intersecting_product(b, c) == [Rational(128553, 19) + I*9521/5, + Rational(17820, 19) + 1602*I, Rational(19264, 19), Rational(336, 19), 1846, 0, 0, 0] + + assert intersecting_product(a, c) == intersecting_product(c, a) + assert intersecting_product(b[1:], c[:-1]) == [Rational(64788, 19) + I*8622/5, + Rational(12804, 19) + 1152*I, Rational(11508, 19), Rational(252, 19), 0, 0, 0, 0] + + assert intersecting_product(a, c[:-2]) == \ + [Rational(-99, 5) + 10*sqrt(5) + 2*sqrt(5)*I/5 + I*3021/40, + -43 + 5*sqrt(5) + 9*sqrt(5)*I + 71*I, Rational(245, 8) + 84*I, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert intersecting_product([u, v, w], [x, y]) == \ + [u*x + u*y + v*x + w*x + w*y, v*y, 0, 0] + + assert intersecting_product([u, v, w, x], [y, z]) == \ + [u*y + u*z + v*y + w*y + w*z + x*y, v*z + x*z, 0, 0] + + assert intersecting_product([u, v], [x, y, z]) == \ + intersecting_product([x, y, z], [u, v]) + + raises(TypeError, lambda: intersecting_product(x, z)) + raises(TypeError, lambda: intersecting_product(u, Rational(8, 3))) + + +def test_convolution_int(): + assert convolution_int([1], [1]) == [1] + assert convolution_int([1, 1], [0]) == [0] + assert convolution_int([1, 2, 3], [4, 5, 6]) == [4, 13, 28, 27, 18] + assert convolution_int([1], [5, 6, 7]) == [5, 6, 7] + assert convolution_int([1, 3], [5, 6, 7]) == [5, 21, 25, 21] + assert convolution_int([10, -5, 1, 3], [-5, 6, 7]) == [-50, 85, 35, -44, 25, 21] + assert convolution_int([0, 1, 0, -1], [1, 0, -1, 0]) == [0, 1, 0, -2, 0, 1] + assert convolution_int( + [-341, -5, 1, 3, -71, -99, 43, 87], + [5, 6, 7, 12, 345, 21, -78, -7, -89] + ) == [-1705, -2071, -2412, -4106, -118035, -9774, 25998, 2981, 5509, + -34317, 19228, 38870, 5485, 1724, -4436, -7743] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py new file mode 100644 index 0000000000000000000000000000000000000000..2c2186ca525b6680350a03edbe44ca88f8f95c3c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py @@ -0,0 +1,59 @@ +from sympy.core.numbers import Rational +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.core import S, symbols +from sympy.testing.pytest import raises +from sympy.discrete.recurrences import linrec + +def test_linrec(): + assert linrec(coeffs=[1, 1], init=[1, 1], n=20) == 10946 + assert linrec(coeffs=[1, 2, 3, 4, 5], init=[1, 1, 0, 2], n=10) == 1040 + assert linrec(coeffs=[0, 0, 11, 13], init=[23, 27], n=25) == 59628567384 + assert linrec(coeffs=[0, 0, 1, 1, 2], init=[1, 5, 3], n=15) == 165 + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=70) == \ + 56889923441670659718376223533331214868804815612050381493741233489928913241 + assert linrec(coeffs=[0]*55 + [1, 1, 2, 3], init=[0]*50 + [1, 2, 3], n=4000) == \ + 702633573874937994980598979769135096432444135301118916539 + + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=10**4) + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=10**5) + + assert all(linrec(coeffs=[1, 1], init=[0, 1], n=n) == fibonacci(n) + for n in range(95, 115)) + + assert all(linrec(coeffs=[1, 1], init=[1, 1], n=n) == fibonacci(n + 1) + for n in range(595, 615)) + + a = [S.Half, Rational(3, 4), Rational(5, 6), 7, Rational(8, 9), Rational(3, 5)] + b = [1, 2, 8, Rational(5, 7), Rational(3, 7), Rational(2, 9), 6] + x, y, z = symbols('x y z') + + assert linrec(coeffs=a[:5], init=b[:4], n=80) == \ + Rational(1726244235456268979436592226626304376013002142588105090705187189, + 1960143456748895967474334873705475211264) + + assert linrec(coeffs=a[:4], init=b[:4], n=50) == \ + Rational(368949940033050147080268092104304441, 504857282956046106624) + + assert linrec(coeffs=a[3:], init=b[:3], n=35) == \ + Rational(97409272177295731943657945116791049305244422833125109, + 814315512679031689453125) + + assert linrec(coeffs=[0]*60 + [Rational(2, 3), Rational(4, 5)], init=b, n=3000) == \ + Rational(26777668739896791448594650497024, 48084516708184142230517578125) + + raises(TypeError, lambda: linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4, 5], n=1)) + raises(TypeError, lambda: linrec(coeffs=a[:4], init=b[:5], n=10000)) + raises(ValueError, lambda: linrec(coeffs=a[:4], init=b[:4], n=-10000)) + raises(TypeError, lambda: linrec(x, b, n=10000)) + raises(TypeError, lambda: linrec(a, y, n=10000)) + + assert linrec(coeffs=[x, y, z], init=[1, 1, 1], n=4) == \ + x**2 + x*y + x*z + y + z + assert linrec(coeffs=[1, 2, 1], init=[x, y, z], n=20) == \ + 269542*x + 664575*y + 578949*z + assert linrec(coeffs=[0, 3, 1, 2], init=[x, y], n=30) == \ + 58516436*x + 56372788*y + assert linrec(coeffs=[0]*50 + [1, 2, 3], init=[x, y, z], n=1000) == \ + 11477135884896*x + 25999077948732*y + 41975630244216*z + assert linrec(coeffs=[], init=[1, 1], n=20) == 0 + assert linrec(coeffs=[x, y, z], init=[1, 2, 3], n=2) == 3 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_transforms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_transforms.py new file mode 100644 index 0000000000000000000000000000000000000000..385514be4cdec2f19cf3a750bdbe0f4f6e21cc6e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/tests/test_transforms.py @@ -0,0 +1,154 @@ +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.core import S, Symbol, symbols, I, Rational +from sympy.discrete import (fft, ifft, ntt, intt, fwht, ifwht, + mobius_transform, inverse_mobius_transform) +from sympy.testing.pytest import raises + + +def test_fft_ifft(): + assert all(tf(ls) == ls for tf in (fft, ifft) + for ls in ([], [Rational(5, 3)])) + + ls = list(range(6)) + fls = [15, -7*sqrt(2)/2 - 4 - sqrt(2)*I/2 + 2*I, 2 + 3*I, + -4 + 7*sqrt(2)/2 - 2*I - sqrt(2)*I/2, -3, + -4 + 7*sqrt(2)/2 + sqrt(2)*I/2 + 2*I, + 2 - 3*I, -7*sqrt(2)/2 - 4 - 2*I + sqrt(2)*I/2] + + assert fft(ls) == fls + assert ifft(fls) == ls + [S.Zero]*2 + + ls = [1 + 2*I, 3 + 4*I, 5 + 6*I] + ifls = [Rational(9, 4) + 3*I, I*Rational(-7, 4), Rational(3, 4) + I, -2 - I/4] + + assert ifft(ls) == ifls + assert fft(ifls) == ls + [S.Zero] + + x = Symbol('x', real=True) + raises(TypeError, lambda: fft(x)) + raises(ValueError, lambda: ifft([x, 2*x, 3*x**2, 4*x**3])) + + +def test_ntt_intt(): + # prime moduli of the form (m*2**k + 1), sequence length + # should be a divisor of 2**k + p = 7*17*2**23 + 1 + q = 2*500000003 + 1 # only for sequences of length 1 or 2 + r = 2*3*5*7 # composite modulus + + assert all(tf(ls, p) == ls for tf in (ntt, intt) + for ls in ([], [5])) + + ls = list(range(6)) + nls = [15, 801133602, 738493201, 334102277, 998244350, 849020224, + 259751156, 12232587] + + assert ntt(ls, p) == nls + assert intt(nls, p) == ls + [0]*2 + + ls = [1 + 2*I, 3 + 4*I, 5 + 6*I] + x = Symbol('x', integer=True) + + raises(TypeError, lambda: ntt(x, p)) + raises(ValueError, lambda: intt([x, 2*x, 3*x**2, 4*x**3], p)) + raises(ValueError, lambda: intt(ls, p)) + raises(ValueError, lambda: ntt([1.2, 2.1, 3.5], p)) + raises(ValueError, lambda: ntt([3, 5, 6], q)) + raises(ValueError, lambda: ntt([4, 5, 7], r)) + raises(ValueError, lambda: ntt([1.0, 2.0, 3.0], p)) + + +def test_fwht_ifwht(): + assert all(tf(ls) == ls for tf in (fwht, ifwht) \ + for ls in ([], [Rational(7, 4)])) + + ls = [213, 321, 43235, 5325, 312, 53] + fls = [49459, 38061, -47661, -37759, 48729, 37543, -48391, -38277] + + assert fwht(ls) == fls + assert ifwht(fls) == ls + [S.Zero]*2 + + ls = [S.Half + 2*I, Rational(3, 7) + 4*I, Rational(5, 6) + 6*I, Rational(7, 3), Rational(9, 4)] + ifls = [Rational(533, 672) + I*3/2, Rational(23, 224) + I/2, Rational(1, 672), Rational(107, 224) - I, + Rational(155, 672) + I*3/2, Rational(-103, 224) + I/2, Rational(-377, 672), Rational(-19, 224) - I] + + assert ifwht(ls) == ifls + assert fwht(ifls) == ls + [S.Zero]*3 + + x, y = symbols('x y') + + raises(TypeError, lambda: fwht(x)) + + ls = [x, 2*x, 3*x**2, 4*x**3] + ifls = [x**3 + 3*x**2/4 + x*Rational(3, 4), + -x**3 + 3*x**2/4 - x/4, + -x**3 - 3*x**2/4 + x*Rational(3, 4), + x**3 - 3*x**2/4 - x/4] + + assert ifwht(ls) == ifls + assert fwht(ifls) == ls + + ls = [x, y, x**2, y**2, x*y] + fls = [x**2 + x*y + x + y**2 + y, + x**2 + x*y + x - y**2 - y, + -x**2 + x*y + x - y**2 + y, + -x**2 + x*y + x + y**2 - y, + x**2 - x*y + x + y**2 + y, + x**2 - x*y + x - y**2 - y, + -x**2 - x*y + x - y**2 + y, + -x**2 - x*y + x + y**2 - y] + + assert fwht(ls) == fls + assert ifwht(fls) == ls + [S.Zero]*3 + + ls = list(range(6)) + + assert fwht(ls) == [x*8 for x in ifwht(ls)] + + +def test_mobius_transform(): + assert all(tf(ls, subset=subset) == ls + for ls in ([], [Rational(7, 4)]) for subset in (True, False) + for tf in (mobius_transform, inverse_mobius_transform)) + + w, x, y, z = symbols('w x y z') + + assert mobius_transform([x, y]) == [x, x + y] + assert inverse_mobius_transform([x, x + y]) == [x, y] + assert mobius_transform([x, y], subset=False) == [x + y, y] + assert inverse_mobius_transform([x + y, y], subset=False) == [x, y] + + assert mobius_transform([w, x, y, z]) == [w, w + x, w + y, w + x + y + z] + assert inverse_mobius_transform([w, w + x, w + y, w + x + y + z]) == \ + [w, x, y, z] + assert mobius_transform([w, x, y, z], subset=False) == \ + [w + x + y + z, x + z, y + z, z] + assert inverse_mobius_transform([w + x + y + z, x + z, y + z, z], subset=False) == \ + [w, x, y, z] + + ls = [Rational(2, 3), Rational(6, 7), Rational(5, 8), 9, Rational(5, 3) + 7*I] + mls = [Rational(2, 3), Rational(32, 21), Rational(31, 24), Rational(1873, 168), + Rational(7, 3) + 7*I, Rational(67, 21) + 7*I, Rational(71, 24) + 7*I, + Rational(2153, 168) + 7*I] + + assert mobius_transform(ls) == mls + assert inverse_mobius_transform(mls) == ls + [S.Zero]*3 + + mls = [Rational(2153, 168) + 7*I, Rational(69, 7), Rational(77, 8), 9, Rational(5, 3) + 7*I, 0, 0, 0] + + assert mobius_transform(ls, subset=False) == mls + assert inverse_mobius_transform(mls, subset=False) == ls + [S.Zero]*3 + + ls = ls[:-1] + mls = [Rational(2, 3), Rational(32, 21), Rational(31, 24), Rational(1873, 168)] + + assert mobius_transform(ls) == mls + assert inverse_mobius_transform(mls) == ls + + mls = [Rational(1873, 168), Rational(69, 7), Rational(77, 8), 9] + + assert mobius_transform(ls, subset=False) == mls + assert inverse_mobius_transform(mls, subset=False) == ls + + raises(TypeError, lambda: mobius_transform(x, subset=True)) + raises(TypeError, lambda: inverse_mobius_transform(y, subset=False)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/transforms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/transforms.py new file mode 100644 index 0000000000000000000000000000000000000000..cb3550837021a4cf99e38c6b15f89ce8bb69b25a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/discrete/transforms.py @@ -0,0 +1,425 @@ +""" +Discrete Fourier Transform, Number Theoretic Transform, +Walsh Hadamard Transform, Mobius Transform +""" + +from sympy.core import S, Symbol, sympify +from sympy.core.function import expand_mul +from sympy.core.numbers import pi, I +from sympy.functions.elementary.trigonometric import sin, cos +from sympy.ntheory import isprime, primitive_root +from sympy.utilities.iterables import ibin, iterable +from sympy.utilities.misc import as_int + + +#----------------------------------------------------------------------------# +# # +# Discrete Fourier Transform # +# # +#----------------------------------------------------------------------------# + +def _fourier_transform(seq, dps, inverse=False): + """Utility function for the Discrete Fourier Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of numeric coefficients " + "for Fourier Transform") + + a = [sympify(arg) for arg in seq] + if any(x.has(Symbol) for x in a): + raise ValueError("Expected non-symbolic coefficients") + + n = len(a) + if n < 2: + return a + + b = n.bit_length() - 1 + if n&(n - 1): # not a power of 2 + b += 1 + n = 2**b + + a += [S.Zero]*(n - len(a)) + for i in range(1, n): + j = int(ibin(i, b, str=True)[::-1], 2) + if i < j: + a[i], a[j] = a[j], a[i] + + ang = -2*pi/n if inverse else 2*pi/n + + if dps is not None: + ang = ang.evalf(dps + 2) + + w = [cos(ang*i) + I*sin(ang*i) for i in range(n // 2)] + + h = 2 + while h <= n: + hf, ut = h // 2, n // h + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], expand_mul(a[i + j + hf]*w[ut * j]) + a[i + j], a[i + j + hf] = u + v, u - v + h *= 2 + + if inverse: + a = [(x/n).evalf(dps) for x in a] if dps is not None \ + else [x/n for x in a] + + return a + + +def fft(seq, dps=None): + r""" + Performs the Discrete Fourier Transform (**DFT**) in the complex domain. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 FFT* requires the number of sample points to be a power of 2. + + This method should be used with default arguments only for short sequences + as the complexity of expressions increases with the size of the sequence. + + Parameters + ========== + + seq : iterable + The sequence on which **DFT** is to be applied. + dps : Integer + Specifies the number of decimal digits for precision. + + Examples + ======== + + >>> from sympy import fft, ifft + + >>> fft([1, 2, 3, 4]) + [10, -2 - 2*I, -2, -2 + 2*I] + >>> ifft(_) + [1, 2, 3, 4] + + >>> ifft([1, 2, 3, 4]) + [5/2, -1/2 + I/2, -1/2, -1/2 - I/2] + >>> fft(_) + [1, 2, 3, 4] + + >>> ifft([1, 7, 3, 4], dps=15) + [3.75, -0.5 - 0.75*I, -1.75, -0.5 + 0.75*I] + >>> fft(_) + [1.0, 7.0, 3.0, 4.0] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Cooley%E2%80%93Tukey_FFT_algorithm + .. [2] https://mathworld.wolfram.com/FastFourierTransform.html + + """ + + return _fourier_transform(seq, dps=dps) + + +def ifft(seq, dps=None): + return _fourier_transform(seq, dps=dps, inverse=True) + +ifft.__doc__ = fft.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Number Theoretic Transform # +# # +#----------------------------------------------------------------------------# + +def _number_theoretic_transform(seq, prime, inverse=False): + """Utility function for the Number Theoretic Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of integer coefficients " + "for Number Theoretic Transform") + + p = as_int(prime) + if not isprime(p): + raise ValueError("Expected prime modulus for " + "Number Theoretic Transform") + + a = [as_int(x) % p for x in seq] + + n = len(a) + if n < 1: + return a + + b = n.bit_length() - 1 + if n&(n - 1): + b += 1 + n = 2**b + + if (p - 1) % n: + raise ValueError("Expected prime modulus of the form (m*2**k + 1)") + + a += [0]*(n - len(a)) + for i in range(1, n): + j = int(ibin(i, b, str=True)[::-1], 2) + if i < j: + a[i], a[j] = a[j], a[i] + + pr = primitive_root(p) + + rt = pow(pr, (p - 1) // n, p) + if inverse: + rt = pow(rt, p - 2, p) + + w = [1]*(n // 2) + for i in range(1, n // 2): + w[i] = w[i - 1]*rt % p + + h = 2 + while h <= n: + hf, ut = h // 2, n // h + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], a[i + j + hf]*w[ut * j] + a[i + j], a[i + j + hf] = (u + v) % p, (u - v) % p + h *= 2 + + if inverse: + rv = pow(n, p - 2, p) + a = [x*rv % p for x in a] + + return a + + +def ntt(seq, prime): + r""" + Performs the Number Theoretic Transform (**NTT**), which specializes the + Discrete Fourier Transform (**DFT**) over quotient ring `Z/pZ` for prime + `p` instead of complex numbers `C`. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 NTT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which **DFT** is to be applied. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for performing + **NTT** on the sequence. + + Examples + ======== + + >>> from sympy import ntt, intt + >>> ntt([1, 2, 3, 4], prime=3*2**8 + 1) + [10, 643, 767, 122] + >>> intt(_, 3*2**8 + 1) + [1, 2, 3, 4] + >>> intt([1, 2, 3, 4], prime=3*2**8 + 1) + [387, 415, 384, 353] + >>> ntt(_, prime=3*2**8 + 1) + [1, 2, 3, 4] + + References + ========== + + .. [1] http://www.apfloat.org/ntt.html + .. [2] https://mathworld.wolfram.com/NumberTheoreticTransform.html + .. [3] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + return _number_theoretic_transform(seq, prime=prime) + + +def intt(seq, prime): + return _number_theoretic_transform(seq, prime=prime, inverse=True) + +intt.__doc__ = ntt.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Walsh Hadamard Transform # +# # +#----------------------------------------------------------------------------# + +def _walsh_hadamard_transform(seq, inverse=False): + """Utility function for the Walsh Hadamard Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of coefficients " + "for Walsh Hadamard Transform") + + a = [sympify(arg) for arg in seq] + n = len(a) + if n < 2: + return a + + if n&(n - 1): + n = 2**n.bit_length() + + a += [S.Zero]*(n - len(a)) + h = 2 + while h <= n: + hf = h // 2 + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], a[i + j + hf] + a[i + j], a[i + j + hf] = u + v, u - v + h *= 2 + + if inverse: + a = [x/n for x in a] + + return a + + +def fwht(seq): + r""" + Performs the Walsh Hadamard Transform (**WHT**), and uses Hadamard + ordering for the sequence. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 FWHT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which WHT is to be applied. + + Examples + ======== + + >>> from sympy import fwht, ifwht + >>> fwht([4, 2, 2, 0, 0, 2, -2, 0]) + [8, 0, 8, 0, 8, 8, 0, 0] + >>> ifwht(_) + [4, 2, 2, 0, 0, 2, -2, 0] + + >>> ifwht([19, -1, 11, -9, -7, 13, -15, 5]) + [2, 0, 4, 0, 3, 10, 0, 0] + >>> fwht(_) + [19, -1, 11, -9, -7, 13, -15, 5] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hadamard_transform + .. [2] https://en.wikipedia.org/wiki/Fast_Walsh%E2%80%93Hadamard_transform + + """ + + return _walsh_hadamard_transform(seq) + + +def ifwht(seq): + return _walsh_hadamard_transform(seq, inverse=True) + +ifwht.__doc__ = fwht.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Mobius Transform for Subset Lattice # +# # +#----------------------------------------------------------------------------# + +def _mobius_transform(seq, sgn, subset): + r"""Utility function for performing Mobius Transform using + Yate's Dynamic Programming method""" + + if not iterable(seq): + raise TypeError("Expected a sequence of coefficients") + + a = [sympify(arg) for arg in seq] + + n = len(a) + if n < 2: + return a + + if n&(n - 1): + n = 2**n.bit_length() + + a += [S.Zero]*(n - len(a)) + + if subset: + i = 1 + while i < n: + for j in range(n): + if j & i: + a[j] += sgn*a[j ^ i] + i *= 2 + + else: + i = 1 + while i < n: + for j in range(n): + if j & i: + continue + a[j] += sgn*a[j ^ i] + i *= 2 + + return a + + +def mobius_transform(seq, subset=True): + r""" + Performs the Mobius Transform for subset lattice with indices of + sequence as bitmasks. + + The indices of each argument, considered as bit strings, correspond + to subsets of a finite set. + + The sequence is automatically padded to the right with zeros, as the + definition of subset/superset based on bitmasks (indices) requires + the size of sequence to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which Mobius Transform is to be applied. + subset : bool + Specifies if Mobius Transform is applied by enumerating subsets + or supersets of the given set. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy import mobius_transform, inverse_mobius_transform + >>> x, y, z = symbols('x y z') + + >>> mobius_transform([x, y, z]) + [x, x + y, x + z, x + y + z] + >>> inverse_mobius_transform(_) + [x, y, z, 0] + + >>> mobius_transform([x, y, z], subset=False) + [x + y + z, y, z, 0] + >>> inverse_mobius_transform(_, subset=False) + [x, y, z, 0] + + >>> mobius_transform([1, 2, 3, 4]) + [1, 3, 4, 10] + >>> inverse_mobius_transform(_) + [1, 2, 3, 4] + >>> mobius_transform([1, 2, 3, 4], subset=False) + [10, 6, 7, 4] + >>> inverse_mobius_transform(_, subset=False) + [1, 2, 3, 4] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/M%C3%B6bius_inversion_formula + .. [2] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + .. [3] https://arxiv.org/pdf/1211.0189.pdf + + """ + + return _mobius_transform(seq, sgn=+1, subset=subset) + +def inverse_mobius_transform(seq, subset=True): + return _mobius_transform(seq, sgn=-1, subset=subset) + +inverse_mobius_transform.__doc__ = mobius_transform.__doc__ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/combinatorial/tests/test_comb_factorials.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/combinatorial/tests/test_comb_factorials.py new file mode 100644 index 0000000000000000000000000000000000000000..6e3986c56736cccec0b3370007e047a1f38f06d1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/combinatorial/tests/test_comb_factorials.py @@ -0,0 +1,653 @@ +from sympy.concrete.products import Product +from sympy.core.function import expand_func +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core import EulerGamma +from sympy.core.numbers import (Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.combinatorial.factorials import (ff, rf, binomial, factorial, factorial2) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.gamma_functions import (gamma, polygamma) +from sympy.polys.polytools import Poly +from sympy.series.order import O +from sympy.simplify.simplify import simplify +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.functions.combinatorial.factorials import subfactorial +from sympy.functions.special.gamma_functions import uppergamma +from sympy.testing.pytest import XFAIL, raises, slow + +#Solves and Fixes Issue #10388 - This is the updated test for the same solved issue + +def test_rf_eval_apply(): + x, y = symbols('x,y') + n, k = symbols('n k', integer=True) + m = Symbol('m', integer=True, nonnegative=True) + + assert rf(nan, y) is nan + assert rf(x, nan) is nan + + assert unchanged(rf, x, y) + + assert rf(oo, 0) == 1 + assert rf(-oo, 0) == 1 + + assert rf(oo, 6) is oo + assert rf(-oo, 7) is -oo + assert rf(-oo, 6) is oo + + assert rf(oo, -6) is oo + assert rf(-oo, -7) is oo + + assert rf(-1, pi) == 0 + assert rf(-5, 1 + I) == 0 + + assert unchanged(rf, -3, k) + assert unchanged(rf, x, Symbol('k', integer=False)) + assert rf(-3, Symbol('k', integer=False)) == 0 + assert rf(Symbol('x', negative=True, integer=True), Symbol('k', integer=False)) == 0 + + assert rf(x, 0) == 1 + assert rf(x, 1) == x + assert rf(x, 2) == x*(x + 1) + assert rf(x, 3) == x*(x + 1)*(x + 2) + assert rf(x, 5) == x*(x + 1)*(x + 2)*(x + 3)*(x + 4) + + assert rf(x, -1) == 1/(x - 1) + assert rf(x, -2) == 1/((x - 1)*(x - 2)) + assert rf(x, -3) == 1/((x - 1)*(x - 2)*(x - 3)) + + assert rf(1, 100) == factorial(100) + + assert rf(x**2 + 3*x, 2) == (x**2 + 3*x)*(x**2 + 3*x + 1) + assert isinstance(rf(x**2 + 3*x, 2), Mul) + assert rf(x**3 + x, -2) == 1/((x**3 + x - 1)*(x**3 + x - 2)) + + assert rf(Poly(x**2 + 3*x, x), 2) == Poly(x**4 + 8*x**3 + 19*x**2 + 12*x, x) + assert isinstance(rf(Poly(x**2 + 3*x, x), 2), Poly) + raises(ValueError, lambda: rf(Poly(x**2 + 3*x, x, y), 2)) + assert rf(Poly(x**3 + x, x), -2) == 1/(x**6 - 9*x**5 + 35*x**4 - 75*x**3 + 94*x**2 - 66*x + 20) + raises(ValueError, lambda: rf(Poly(x**3 + x, x, y), -2)) + + assert rf(x, m).is_integer is None + assert rf(n, k).is_integer is None + assert rf(n, m).is_integer is True + assert rf(n, k + pi).is_integer is False + assert rf(n, m + pi).is_integer is False + assert rf(pi, m).is_integer is False + + def check(x, k, o, n): + a, b = Dummy(), Dummy() + r = lambda x, k: o(a, b).rewrite(n).subs({a:x,b:k}) + for i in range(-5,5): + for j in range(-5,5): + assert o(i, j) == r(i, j), (o, n, i, j) + check(x, k, rf, ff) + check(x, k, rf, binomial) + check(n, k, rf, factorial) + check(x, y, rf, factorial) + check(x, y, rf, binomial) + + assert rf(x, k).rewrite(ff) == ff(x + k - 1, k) + assert rf(x, k).rewrite(gamma) == Piecewise( + (gamma(k + x)/gamma(x), x > 0), + ((-1)**k*gamma(1 - x)/gamma(-k - x + 1), True)) + assert rf(5, k).rewrite(gamma) == gamma(k + 5)/24 + assert rf(x, k).rewrite(binomial) == factorial(k)*binomial(x + k - 1, k) + assert rf(n, k).rewrite(factorial) == Piecewise( + (factorial(k + n - 1)/factorial(n - 1), n > 0), + ((-1)**k*factorial(-n)/factorial(-k - n), True)) + assert rf(5, k).rewrite(factorial) == factorial(k + 4)/24 + assert rf(x, y).rewrite(factorial) == rf(x, y) + assert rf(x, y).rewrite(binomial) == rf(x, y) + + import random + from mpmath import rf as mpmath_rf + for i in range(100): + x = -500 + 500 * random.random() + k = -500 + 500 * random.random() + assert (abs(mpmath_rf(x, k) - rf(x, k)) < 10**(-15)) + + +def test_ff_eval_apply(): + x, y = symbols('x,y') + n, k = symbols('n k', integer=True) + m = Symbol('m', integer=True, nonnegative=True) + + assert ff(nan, y) is nan + assert ff(x, nan) is nan + + assert unchanged(ff, x, y) + + assert ff(oo, 0) == 1 + assert ff(-oo, 0) == 1 + + assert ff(oo, 6) is oo + assert ff(-oo, 7) is -oo + assert ff(-oo, 6) is oo + + assert ff(oo, -6) is oo + assert ff(-oo, -7) is oo + + assert ff(x, 0) == 1 + assert ff(x, 1) == x + assert ff(x, 2) == x*(x - 1) + assert ff(x, 3) == x*(x - 1)*(x - 2) + assert ff(x, 5) == x*(x - 1)*(x - 2)*(x - 3)*(x - 4) + + assert ff(x, -1) == 1/(x + 1) + assert ff(x, -2) == 1/((x + 1)*(x + 2)) + assert ff(x, -3) == 1/((x + 1)*(x + 2)*(x + 3)) + + assert ff(100, 100) == factorial(100) + + assert ff(2*x**2 - 5*x, 2) == (2*x**2 - 5*x)*(2*x**2 - 5*x - 1) + assert isinstance(ff(2*x**2 - 5*x, 2), Mul) + assert ff(x**2 + 3*x, -2) == 1/((x**2 + 3*x + 1)*(x**2 + 3*x + 2)) + + assert ff(Poly(2*x**2 - 5*x, x), 2) == Poly(4*x**4 - 28*x**3 + 59*x**2 - 35*x, x) + assert isinstance(ff(Poly(2*x**2 - 5*x, x), 2), Poly) + raises(ValueError, lambda: ff(Poly(2*x**2 - 5*x, x, y), 2)) + assert ff(Poly(x**2 + 3*x, x), -2) == 1/(x**4 + 12*x**3 + 49*x**2 + 78*x + 40) + raises(ValueError, lambda: ff(Poly(x**2 + 3*x, x, y), -2)) + + + assert ff(x, m).is_integer is None + assert ff(n, k).is_integer is None + assert ff(n, m).is_integer is True + assert ff(n, k + pi).is_integer is False + assert ff(n, m + pi).is_integer is False + assert ff(pi, m).is_integer is False + + assert isinstance(ff(x, x), ff) + assert ff(n, n) == factorial(n) + + def check(x, k, o, n): + a, b = Dummy(), Dummy() + r = lambda x, k: o(a, b).rewrite(n).subs({a:x,b:k}) + for i in range(-5,5): + for j in range(-5,5): + assert o(i, j) == r(i, j), (o, n) + check(x, k, ff, rf) + check(x, k, ff, gamma) + check(n, k, ff, factorial) + check(x, k, ff, binomial) + check(x, y, ff, factorial) + check(x, y, ff, binomial) + + assert ff(x, k).rewrite(rf) == rf(x - k + 1, k) + assert ff(x, k).rewrite(gamma) == Piecewise( + (gamma(x + 1)/gamma(-k + x + 1), x >= 0), + ((-1)**k*gamma(k - x)/gamma(-x), True)) + assert ff(5, k).rewrite(gamma) == 120/gamma(6 - k) + assert ff(n, k).rewrite(factorial) == Piecewise( + (factorial(n)/factorial(-k + n), n >= 0), + ((-1)**k*factorial(k - n - 1)/factorial(-n - 1), True)) + assert ff(5, k).rewrite(factorial) == 120/factorial(5 - k) + assert ff(x, k).rewrite(binomial) == factorial(k) * binomial(x, k) + assert ff(x, y).rewrite(factorial) == ff(x, y) + assert ff(x, y).rewrite(binomial) == ff(x, y) + + import random + from mpmath import ff as mpmath_ff + for i in range(100): + x = -500 + 500 * random.random() + k = -500 + 500 * random.random() + a = mpmath_ff(x, k) + b = ff(x, k) + assert (abs(a - b) < abs(a) * 10**(-15)) + + +def test_rf_ff_eval_hiprec(): + maple = Float('6.9109401292234329956525265438452') + us = ff(18, Rational(2, 3)).evalf(32) + assert abs(us - maple)/us < 1e-31 + + maple = Float('6.8261540131125511557924466355367') + us = rf(18, Rational(2, 3)).evalf(32) + assert abs(us - maple)/us < 1e-31 + + maple = Float('34.007346127440197150854651814225') + us = rf(Float('4.4', 32), Float('2.2', 32)) + assert abs(us - maple)/us < 1e-31 + + +def test_rf_lambdify_mpmath(): + from sympy.utilities.lambdify import lambdify + x, y = symbols('x,y') + f = lambdify((x,y), rf(x, y), 'mpmath') + maple = Float('34.007346127440197') + us = f(4.4, 2.2) + assert abs(us - maple)/us < 1e-15 + + +def test_factorial(): + x = Symbol('x') + n = Symbol('n', integer=True) + k = Symbol('k', integer=True, nonnegative=True) + r = Symbol('r', integer=False) + s = Symbol('s', integer=False, negative=True) + t = Symbol('t', nonnegative=True) + u = Symbol('u', noninteger=True) + + assert factorial(-2) is zoo + assert factorial(0) == 1 + assert factorial(7) == 5040 + assert factorial(19) == 121645100408832000 + assert factorial(31) == 8222838654177922817725562880000000 + assert factorial(n).func == factorial + assert factorial(2*n).func == factorial + + assert factorial(x).is_integer is None + assert factorial(n).is_integer is None + assert factorial(k).is_integer + assert factorial(r).is_integer is None + + assert factorial(n).is_positive is None + assert factorial(k).is_positive + + assert factorial(x).is_real is None + assert factorial(n).is_real is None + assert factorial(k).is_real is True + assert factorial(r).is_real is None + assert factorial(s).is_real is True + assert factorial(t).is_real is True + assert factorial(u).is_real is True + + assert factorial(x).is_composite is None + assert factorial(n).is_composite is None + assert factorial(k).is_composite is None + assert factorial(k + 3).is_composite is True + assert factorial(r).is_composite is None + assert factorial(s).is_composite is None + assert factorial(t).is_composite is None + assert factorial(u).is_composite is None + + assert factorial(oo) is oo + + +def test_factorial_Mod(): + pr = Symbol('pr', prime=True) + p, q = 10**9 + 9, 10**9 + 33 # prime modulo + r, s = 10**7 + 5, 33333333 # composite modulo + assert Mod(factorial(pr - 1), pr) == pr - 1 + assert Mod(factorial(pr - 1), -pr) == -1 + assert Mod(factorial(r - 1, evaluate=False), r) == 0 + assert Mod(factorial(s - 1, evaluate=False), s) == 0 + assert Mod(factorial(p - 1, evaluate=False), p) == p - 1 + assert Mod(factorial(q - 1, evaluate=False), q) == q - 1 + assert Mod(factorial(p - 50, evaluate=False), p) == 854928834 + assert Mod(factorial(q - 1800, evaluate=False), q) == 905504050 + assert Mod(factorial(153, evaluate=False), r) == Mod(factorial(153), r) + assert Mod(factorial(255, evaluate=False), s) == Mod(factorial(255), s) + assert Mod(factorial(4, evaluate=False), 3) == S.Zero + assert Mod(factorial(5, evaluate=False), 6) == S.Zero + + +def test_factorial_diff(): + n = Symbol('n', integer=True) + + assert factorial(n).diff(n) == \ + gamma(1 + n)*polygamma(0, 1 + n) + assert factorial(n**2).diff(n) == \ + 2*n*gamma(1 + n**2)*polygamma(0, 1 + n**2) + raises(ArgumentIndexError, lambda: factorial(n**2).fdiff(2)) + + +def test_factorial_series(): + n = Symbol('n', integer=True) + + assert factorial(n).series(n, 0, 3) == \ + 1 - n*EulerGamma + n**2*(EulerGamma**2/2 + pi**2/12) + O(n**3) + + +def test_factorial_rewrite(): + n = Symbol('n', integer=True) + k = Symbol('k', integer=True, nonnegative=True) + + assert factorial(n).rewrite(gamma) == gamma(n + 1) + _i = Dummy('i') + assert factorial(k).rewrite(Product).dummy_eq(Product(_i, (_i, 1, k))) + assert factorial(n).rewrite(Product) == factorial(n) + + +def test_factorial2(): + n = Symbol('n', integer=True) + + assert factorial2(-1) == 1 + assert factorial2(0) == 1 + assert factorial2(7) == 105 + assert factorial2(8) == 384 + + # The following is exhaustive + tt = Symbol('tt', integer=True, nonnegative=True) + tte = Symbol('tte', even=True, nonnegative=True) + tpe = Symbol('tpe', even=True, positive=True) + tto = Symbol('tto', odd=True, nonnegative=True) + tf = Symbol('tf', integer=True, nonnegative=False) + tfe = Symbol('tfe', even=True, nonnegative=False) + tfo = Symbol('tfo', odd=True, nonnegative=False) + ft = Symbol('ft', integer=False, nonnegative=True) + ff = Symbol('ff', integer=False, nonnegative=False) + fn = Symbol('fn', integer=False) + nt = Symbol('nt', nonnegative=True) + nf = Symbol('nf', nonnegative=False) + nn = Symbol('nn') + z = Symbol('z', zero=True) + #Solves and Fixes Issue #10388 - This is the updated test for the same solved issue + raises(ValueError, lambda: factorial2(oo)) + raises(ValueError, lambda: factorial2(Rational(5, 2))) + raises(ValueError, lambda: factorial2(-4)) + assert factorial2(n).is_integer is None + assert factorial2(tt - 1).is_integer + assert factorial2(tte - 1).is_integer + assert factorial2(tpe - 3).is_integer + assert factorial2(tto - 4).is_integer + assert factorial2(tto - 2).is_integer + assert factorial2(tf).is_integer is None + assert factorial2(tfe).is_integer is None + assert factorial2(tfo).is_integer is None + assert factorial2(ft).is_integer is None + assert factorial2(ff).is_integer is None + assert factorial2(fn).is_integer is None + assert factorial2(nt).is_integer is None + assert factorial2(nf).is_integer is None + assert factorial2(nn).is_integer is None + + assert factorial2(n).is_positive is None + assert factorial2(tt - 1).is_positive is True + assert factorial2(tte - 1).is_positive is True + assert factorial2(tpe - 3).is_positive is True + assert factorial2(tpe - 1).is_positive is True + assert factorial2(tto - 2).is_positive is True + assert factorial2(tto - 1).is_positive is True + assert factorial2(tf).is_positive is None + assert factorial2(tfe).is_positive is None + assert factorial2(tfo).is_positive is None + assert factorial2(ft).is_positive is None + assert factorial2(ff).is_positive is None + assert factorial2(fn).is_positive is None + assert factorial2(nt).is_positive is None + assert factorial2(nf).is_positive is None + assert factorial2(nn).is_positive is None + + assert factorial2(tt).is_even is None + assert factorial2(tt).is_odd is None + assert factorial2(tte).is_even is None + assert factorial2(tte).is_odd is None + assert factorial2(tte + 2).is_even is True + assert factorial2(tpe).is_even is True + assert factorial2(tpe).is_odd is False + assert factorial2(tto).is_odd is True + assert factorial2(tf).is_even is None + assert factorial2(tf).is_odd is None + assert factorial2(tfe).is_even is None + assert factorial2(tfe).is_odd is None + assert factorial2(tfo).is_even is False + assert factorial2(tfo).is_odd is None + assert factorial2(z).is_even is False + assert factorial2(z).is_odd is True + + +def test_factorial2_rewrite(): + n = Symbol('n', integer=True) + assert factorial2(n).rewrite(gamma) == \ + 2**(n/2)*Piecewise((1, Eq(Mod(n, 2), 0)), (sqrt(2)/sqrt(pi), Eq(Mod(n, 2), 1)))*gamma(n/2 + 1) + assert factorial2(2*n).rewrite(gamma) == 2**n*gamma(n + 1) + assert factorial2(2*n + 1).rewrite(gamma) == \ + sqrt(2)*2**(n + S.Half)*gamma(n + Rational(3, 2))/sqrt(pi) + + +def test_binomial(): + x = Symbol('x') + n = Symbol('n', integer=True) + nz = Symbol('nz', integer=True, nonzero=True) + k = Symbol('k', integer=True) + kp = Symbol('kp', integer=True, positive=True) + kn = Symbol('kn', integer=True, negative=True) + u = Symbol('u', negative=True) + v = Symbol('v', nonnegative=True) + p = Symbol('p', positive=True) + z = Symbol('z', zero=True) + nt = Symbol('nt', integer=False) + kt = Symbol('kt', integer=False) + a = Symbol('a', integer=True, nonnegative=True) + b = Symbol('b', integer=True, nonnegative=True) + + assert binomial(0, 0) == 1 + assert binomial(1, 1) == 1 + assert binomial(10, 10) == 1 + assert binomial(n, z) == 1 + assert binomial(1, 2) == 0 + assert binomial(-1, 2) == 1 + assert binomial(1, -1) == 0 + assert binomial(-1, 1) == -1 + assert binomial(-1, -1) == 0 + assert binomial(S.Half, S.Half) == 1 + assert binomial(-10, 1) == -10 + assert binomial(-10, 7) == -11440 + assert binomial(n, -1) == 0 # holds for all integers (negative, zero, positive) + assert binomial(kp, -1) == 0 + assert binomial(nz, 0) == 1 + assert expand_func(binomial(n, 1)) == n + assert expand_func(binomial(n, 2)) == n*(n - 1)/2 + assert expand_func(binomial(n, n - 2)) == n*(n - 1)/2 + assert expand_func(binomial(n, n - 1)) == n + assert binomial(n, 3).func == binomial + assert binomial(n, 3).expand(func=True) == n**3/6 - n**2/2 + n/3 + assert expand_func(binomial(n, 3)) == n*(n - 2)*(n - 1)/6 + assert binomial(n, n).func == binomial # e.g. (-1, -1) == 0, (2, 2) == 1 + assert binomial(n, n + 1).func == binomial # e.g. (-1, 0) == 1 + assert binomial(kp, kp + 1) == 0 + assert binomial(kn, kn) == 0 # issue #14529 + assert binomial(n, u).func == binomial + assert binomial(kp, u).func == binomial + assert binomial(n, p).func == binomial + assert binomial(n, k).func == binomial + assert binomial(n, n + p).func == binomial + assert binomial(kp, kp + p).func == binomial + + assert expand_func(binomial(n, n - 3)) == n*(n - 2)*(n - 1)/6 + + assert binomial(n, k).is_integer + assert binomial(nt, k).is_integer is None + assert binomial(x, nt).is_integer is False + + assert binomial(gamma(25), 6) == 79232165267303928292058750056084441948572511312165380965440075720159859792344339983120618959044048198214221915637090855535036339620413440000 + assert binomial(1324, 47) == 906266255662694632984994480774946083064699457235920708992926525848438478406790323869952 + assert binomial(1735, 43) == 190910140420204130794758005450919715396159959034348676124678207874195064798202216379800 + assert binomial(2512, 53) == 213894469313832631145798303740098720367984955243020898718979538096223399813295457822575338958939834177325304000 + assert binomial(3383, 52) == 27922807788818096863529701501764372757272890613101645521813434902890007725667814813832027795881839396839287659777235 + assert binomial(4321, 51) == 124595639629264868916081001263541480185227731958274383287107643816863897851139048158022599533438936036467601690983780576 + + assert binomial(a, b).is_nonnegative is True + assert binomial(-1, 2, evaluate=False).is_nonnegative is True + assert binomial(10, 5, evaluate=False).is_nonnegative is True + assert binomial(10, -3, evaluate=False).is_nonnegative is True + assert binomial(-10, -3, evaluate=False).is_nonnegative is True + assert binomial(-10, 2, evaluate=False).is_nonnegative is True + assert binomial(-10, 1, evaluate=False).is_nonnegative is False + assert binomial(-10, 7, evaluate=False).is_nonnegative is False + + # issue #14625 + for _ in (pi, -pi, nt, v, a): + assert binomial(_, _) == 1 + assert binomial(_, _ - 1) == _ + assert isinstance(binomial(u, u), binomial) + assert isinstance(binomial(u, u - 1), binomial) + assert isinstance(binomial(x, x), binomial) + assert isinstance(binomial(x, x - 1), binomial) + + #issue #18802 + assert expand_func(binomial(x + 1, x)) == x + 1 + assert expand_func(binomial(x, x - 1)) == x + assert expand_func(binomial(x + 1, x - 1)) == x*(x + 1)/2 + assert expand_func(binomial(x**2 + 1, x**2)) == x**2 + 1 + + # issue #13980 and #13981 + assert binomial(-7, -5) == 0 + assert binomial(-23, -12) == 0 + assert binomial(Rational(13, 2), -10) == 0 + assert binomial(-49, -51) == 0 + + assert binomial(19, Rational(-7, 2)) == S(-68719476736)/(911337863661225*pi) + assert binomial(0, Rational(3, 2)) == S(-2)/(3*pi) + assert binomial(-3, Rational(-7, 2)) is zoo + assert binomial(kn, kt) is zoo + + assert binomial(nt, kt).func == binomial + assert binomial(nt, Rational(15, 6)) == 8*gamma(nt + 1)/(15*sqrt(pi)*gamma(nt - Rational(3, 2))) + assert binomial(Rational(20, 3), Rational(-10, 8)) == gamma(Rational(23, 3))/(gamma(Rational(-1, 4))*gamma(Rational(107, 12))) + assert binomial(Rational(19, 2), Rational(-7, 2)) == Rational(-1615, 8388608) + assert binomial(Rational(-13, 5), Rational(-7, 8)) == gamma(Rational(-8, 5))/(gamma(Rational(-29, 40))*gamma(Rational(1, 8))) + assert binomial(Rational(-19, 8), Rational(-13, 5)) == gamma(Rational(-11, 8))/(gamma(Rational(-8, 5))*gamma(Rational(49, 40))) + + # binomial for complexes + assert binomial(I, Rational(-89, 8)) == gamma(1 + I)/(gamma(Rational(-81, 8))*gamma(Rational(97, 8) + I)) + assert binomial(I, 2*I) == gamma(1 + I)/(gamma(1 - I)*gamma(1 + 2*I)) + assert binomial(-7, I) is zoo + assert binomial(Rational(-7, 6), I) == gamma(Rational(-1, 6))/(gamma(Rational(-1, 6) - I)*gamma(1 + I)) + assert binomial((1+2*I), (1+3*I)) == gamma(2 + 2*I)/(gamma(1 - I)*gamma(2 + 3*I)) + assert binomial(I, 5) == Rational(1, 3) - I/S(12) + assert binomial((2*I + 3), 7) == -13*I/S(63) + assert isinstance(binomial(I, n), binomial) + assert expand_func(binomial(3, 2, evaluate=False)) == 3 + assert expand_func(binomial(n, 0, evaluate=False)) == 1 + assert expand_func(binomial(n, -2, evaluate=False)) == 0 + assert expand_func(binomial(n, k)) == binomial(n, k) + + +def test_binomial_Mod(): + p, q = 10**5 + 3, 10**9 + 33 # prime modulo + r = 10**7 + 5 # composite modulo + + # A few tests to get coverage + # Lucas Theorem + assert Mod(binomial(156675, 4433, evaluate=False), p) == Mod(binomial(156675, 4433), p) + + # factorial Mod + assert Mod(binomial(1234, 432, evaluate=False), q) == Mod(binomial(1234, 432), q) + + # binomial factorize + assert Mod(binomial(253, 113, evaluate=False), r) == Mod(binomial(253, 113), r) + + # using Granville's generalisation of Lucas' Theorem + assert Mod(binomial(10**18, 10**12, evaluate=False), p*p) == 3744312326 + + +@slow +def test_binomial_Mod_slow(): + p, q = 10**5 + 3, 10**9 + 33 # prime modulo + r, s = 10**7 + 5, 33333333 # composite modulo + + n, k, m = symbols('n k m') + assert (binomial(n, k) % q).subs({n: s, k: p}) == Mod(binomial(s, p), q) + assert (binomial(n, k) % m).subs({n: 8, k: 5, m: 13}) == 4 + assert (binomial(9, k) % 7).subs(k, 2) == 1 + + # Lucas Theorem + assert Mod(binomial(123456, 43253, evaluate=False), p) == Mod(binomial(123456, 43253), p) + assert Mod(binomial(-178911, 237, evaluate=False), p) == Mod(-binomial(178911 + 237 - 1, 237), p) + assert Mod(binomial(-178911, 238, evaluate=False), p) == Mod(binomial(178911 + 238 - 1, 238), p) + + # factorial Mod + assert Mod(binomial(9734, 451, evaluate=False), q) == Mod(binomial(9734, 451), q) + assert Mod(binomial(-10733, 4459, evaluate=False), q) == Mod(binomial(-10733, 4459), q) + assert Mod(binomial(-15733, 4458, evaluate=False), q) == Mod(binomial(-15733, 4458), q) + assert Mod(binomial(23, -38, evaluate=False), q) is S.Zero + assert Mod(binomial(23, 38, evaluate=False), q) is S.Zero + + # binomial factorize + assert Mod(binomial(753, 119, evaluate=False), r) == Mod(binomial(753, 119), r) + assert Mod(binomial(3781, 948, evaluate=False), s) == Mod(binomial(3781, 948), s) + assert Mod(binomial(25773, 1793, evaluate=False), s) == Mod(binomial(25773, 1793), s) + assert Mod(binomial(-753, 118, evaluate=False), r) == Mod(binomial(-753, 118), r) + assert Mod(binomial(-25773, 1793, evaluate=False), s) == Mod(binomial(-25773, 1793), s) + + +def test_binomial_diff(): + n = Symbol('n', integer=True) + k = Symbol('k', integer=True) + + assert binomial(n, k).diff(n) == \ + (-polygamma(0, 1 + n - k) + polygamma(0, 1 + n))*binomial(n, k) + assert binomial(n**2, k**3).diff(n) == \ + 2*n*(-polygamma( + 0, 1 + n**2 - k**3) + polygamma(0, 1 + n**2))*binomial(n**2, k**3) + + assert binomial(n, k).diff(k) == \ + (-polygamma(0, 1 + k) + polygamma(0, 1 + n - k))*binomial(n, k) + assert binomial(n**2, k**3).diff(k) == \ + 3*k**2*(-polygamma( + 0, 1 + k**3) + polygamma(0, 1 + n**2 - k**3))*binomial(n**2, k**3) + raises(ArgumentIndexError, lambda: binomial(n, k).fdiff(3)) + + +def test_binomial_rewrite(): + n = Symbol('n', integer=True) + k = Symbol('k', integer=True) + x = Symbol('x') + + assert binomial(n, k).rewrite( + factorial) == factorial(n)/(factorial(k)*factorial(n - k)) + assert binomial( + n, k).rewrite(gamma) == gamma(n + 1)/(gamma(k + 1)*gamma(n - k + 1)) + assert binomial(n, k).rewrite(ff) == ff(n, k) / factorial(k) + assert binomial(n, x).rewrite(ff) == binomial(n, x) + + +@XFAIL +def test_factorial_simplify_fail(): + # simplify(factorial(x + 1).diff(x) - ((x + 1)*factorial(x)).diff(x))) == 0 + from sympy.abc import x + assert simplify(x*polygamma(0, x + 1) - x*polygamma(0, x + 2) + + polygamma(0, x + 1) - polygamma(0, x + 2) + 1) == 0 + + +def test_subfactorial(): + assert all(subfactorial(i) == ans for i, ans in enumerate( + [1, 0, 1, 2, 9, 44, 265, 1854, 14833, 133496])) + assert subfactorial(oo) is oo + assert subfactorial(nan) is nan + assert subfactorial(23) == 9510425471055777937262 + assert unchanged(subfactorial, 2.2) + + x = Symbol('x') + assert subfactorial(x).rewrite(uppergamma) == uppergamma(x + 1, -1)/S.Exp1 + + tt = Symbol('tt', integer=True, nonnegative=True) + tf = Symbol('tf', integer=True, nonnegative=False) + tn = Symbol('tf', integer=True) + ft = Symbol('ft', integer=False, nonnegative=True) + ff = Symbol('ff', integer=False, nonnegative=False) + fn = Symbol('ff', integer=False) + nt = Symbol('nt', nonnegative=True) + nf = Symbol('nf', nonnegative=False) + nn = Symbol('nf') + te = Symbol('te', even=True, nonnegative=True) + to = Symbol('to', odd=True, nonnegative=True) + assert subfactorial(tt).is_integer + assert subfactorial(tf).is_integer is None + assert subfactorial(tn).is_integer is None + assert subfactorial(ft).is_integer is None + assert subfactorial(ff).is_integer is None + assert subfactorial(fn).is_integer is None + assert subfactorial(nt).is_integer is None + assert subfactorial(nf).is_integer is None + assert subfactorial(nn).is_integer is None + assert subfactorial(tt).is_nonnegative + assert subfactorial(tf).is_nonnegative is None + assert subfactorial(tn).is_nonnegative is None + assert subfactorial(ft).is_nonnegative is None + assert subfactorial(ff).is_nonnegative is None + assert subfactorial(fn).is_nonnegative is None + assert subfactorial(nt).is_nonnegative is None + assert subfactorial(nf).is_nonnegative is None + assert subfactorial(nn).is_nonnegative is None + assert subfactorial(tt).is_even is None + assert subfactorial(tt).is_odd is None + assert subfactorial(te).is_odd is True + assert subfactorial(to).is_even is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..78034e72ef2ed722c3ae685a87cf4df618a982b0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/__init__.py @@ -0,0 +1 @@ +# Stub __init__.py for sympy.functions.elementary diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 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b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/_trigonometric_special.py new file mode 100644 index 0000000000000000000000000000000000000000..fdf8c9d06241b46e791afe76836ea33e6d4fb1c8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/_trigonometric_special.py @@ -0,0 +1,261 @@ +r"""A module for special angle formulas for trigonometric functions + +TODO +==== + +This module should be developed in the future to contain direct square root +representation of + +.. math + F(\frac{n}{m} \pi) + +for every + +- $m \in \{ 3, 5, 17, 257, 65537 \}$ +- $n \in \mathbb{N}$, $0 \le n < m$ +- $F \in \{\sin, \cos, \tan, \csc, \sec, \cot\}$ + +Without multi-step rewrites +(e.g. $\tan \to \cos/\sin \to \cos/\sqrt \to \ sqrt$) +or using chebyshev identities +(e.g. $\cos \to \cos + \cos^2 + \cdots \to \sqrt{} + \sqrt{}^2 + \cdots $), +which are trivial to implement in sympy, +and had used to give overly complicated expressions. + +The reference can be found below, if anyone may need help implementing them. + +References +========== + +.. [*] Gottlieb, Christian. (1999). The Simple and straightforward construction + of the regular 257-gon. The Mathematical Intelligencer. 21. 31-37. + 10.1007/BF03024829. +.. [*] https://resources.wolframcloud.com/FunctionRepository/resources/Cos2PiOverFermatPrime +""" +from __future__ import annotations +from typing import Callable +from functools import reduce +from sympy.core.expr import Expr +from sympy.core.singleton import S +from sympy.core.intfunc import igcdex +from sympy.core.numbers import Integer +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.core.cache import cacheit + + +def migcdex(*x: int) -> tuple[tuple[int, ...], int]: + r"""Compute extended gcd for multiple integers. + + Explanation + =========== + + Given the integers $x_1, \cdots, x_n$ and + an extended gcd for multiple arguments are defined as a solution + $(y_1, \cdots, y_n), g$ for the diophantine equation + $x_1 y_1 + \cdots + x_n y_n = g$ such that + $g = \gcd(x_1, \cdots, x_n)$. + + Examples + ======== + + >>> from sympy.functions.elementary._trigonometric_special import migcdex + >>> migcdex() + ((), 0) + >>> migcdex(4) + ((1,), 4) + >>> migcdex(4, 6) + ((-1, 1), 2) + >>> migcdex(6, 10, 15) + ((1, 1, -1), 1) + """ + if not x: + return (), 0 + + if len(x) == 1: + return (1,), x[0] + + if len(x) == 2: + u, v, h = igcdex(x[0], x[1]) + return (u, v), h + + y, g = migcdex(*x[1:]) + u, v, h = igcdex(x[0], g) + return (u, *(v * i for i in y)), h + + +def ipartfrac(*denoms: int) -> tuple[int, ...]: + r"""Compute the partial fraction decomposition. + + Explanation + =========== + + Given a rational number $\frac{1}{q_1 \cdots q_n}$ where all + $q_1, \cdots, q_n$ are pairwise coprime, + + A partial fraction decomposition is defined as + + .. math:: + \frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n} + + And it can be derived from solving the following diophantine equation for + the $p_1, \cdots, p_n$ + + .. math:: + 1 = p_1 \prod_{i \ne 1}q_i + \cdots + p_n \prod_{i \ne n}q_i + + Where $q_1, \cdots, q_n$ being pairwise coprime implies + $\gcd(\prod_{i \ne 1}q_i, \cdots, \prod_{i \ne n}q_i) = 1$, + which guarantees the existence of the solution. + + It is sufficient to compute partial fraction decomposition only + for numerator $1$ because partial fraction decomposition for any + $\frac{n}{q_1 \cdots q_n}$ can be easily computed by multiplying + the result by $n$ afterwards. + + Parameters + ========== + + denoms : int + The pairwise coprime integer denominators $q_i$ which defines the + rational number $\frac{1}{q_1 \cdots q_n}$ + + Returns + ======= + + tuple[int, ...] + The list of numerators which semantically corresponds to $p_i$ of the + partial fraction decomposition + $\frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n}$ + + Examples + ======== + + >>> from sympy import Rational, Mul + >>> from sympy.functions.elementary._trigonometric_special import ipartfrac + + >>> denoms = 2, 3, 5 + >>> numers = ipartfrac(2, 3, 5) + >>> numers + (1, 7, -14) + + >>> Rational(1, Mul(*denoms)) + 1/30 + >>> out = 0 + >>> for n, d in zip(numers, denoms): + ... out += Rational(n, d) + >>> out + 1/30 + """ + if not denoms: + return () + + def mul(x: int, y: int) -> int: + return x * y + + denom = reduce(mul, denoms) + a = [denom // x for x in denoms] + h, _ = migcdex(*a) + return h + + +def fermat_coords(n: int) -> list[int] | None: + """If n can be factored in terms of Fermat primes with + multiplicity of each being 1, return those primes, else + None + """ + primes = [] + for p in [3, 5, 17, 257, 65537]: + quotient, remainder = divmod(n, p) + if remainder == 0: + n = quotient + primes.append(p) + if n == 1: + return primes + return None + + +@cacheit +def cos_3() -> Expr: + r"""Computes $\cos \frac{\pi}{3}$ in square roots""" + return S.Half + + +@cacheit +def cos_5() -> Expr: + r"""Computes $\cos \frac{\pi}{5}$ in square roots""" + return (sqrt(5) + 1) / 4 + + +@cacheit +def cos_17() -> Expr: + r"""Computes $\cos \frac{\pi}{17}$ in square roots""" + return sqrt( + (15 + sqrt(17)) / 32 + sqrt(2) * (sqrt(17 - sqrt(17)) + + sqrt(sqrt(2) * (-8 * sqrt(17 + sqrt(17)) - (1 - sqrt(17)) + * sqrt(17 - sqrt(17))) + 6 * sqrt(17) + 34)) / 32) + + +@cacheit +def cos_257() -> Expr: + r"""Computes $\cos \frac{\pi}{257}$ in square roots + + References + ========== + + .. [*] https://math.stackexchange.com/questions/516142/how-does-cos2-pi-257-look-like-in-real-radicals + .. [*] https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html + """ + def f1(a: Expr, b: Expr) -> tuple[Expr, Expr]: + return (a + sqrt(a**2 + b)) / 2, (a - sqrt(a**2 + b)) / 2 + + def f2(a: Expr, b: Expr) -> Expr: + return (a - sqrt(a**2 + b))/2 + + t1, t2 = f1(S.NegativeOne, Integer(256)) + z1, z3 = f1(t1, Integer(64)) + z2, z4 = f1(t2, Integer(64)) + y1, y5 = f1(z1, 4*(5 + t1 + 2*z1)) + y6, y2 = f1(z2, 4*(5 + t2 + 2*z2)) + y3, y7 = f1(z3, 4*(5 + t1 + 2*z3)) + y8, y4 = f1(z4, 4*(5 + t2 + 2*z4)) + x1, x9 = f1(y1, -4*(t1 + y1 + y3 + 2*y6)) + x2, x10 = f1(y2, -4*(t2 + y2 + y4 + 2*y7)) + x3, x11 = f1(y3, -4*(t1 + y3 + y5 + 2*y8)) + x4, x12 = f1(y4, -4*(t2 + y4 + y6 + 2*y1)) + x5, x13 = f1(y5, -4*(t1 + y5 + y7 + 2*y2)) + x6, x14 = f1(y6, -4*(t2 + y6 + y8 + 2*y3)) + x15, x7 = f1(y7, -4*(t1 + y7 + y1 + 2*y4)) + x8, x16 = f1(y8, -4*(t2 + y8 + y2 + 2*y5)) + v1 = f2(x1, -4*(x1 + x2 + x3 + x6)) + v2 = f2(x2, -4*(x2 + x3 + x4 + x7)) + v3 = f2(x8, -4*(x8 + x9 + x10 + x13)) + v4 = f2(x9, -4*(x9 + x10 + x11 + x14)) + v5 = f2(x10, -4*(x10 + x11 + x12 + x15)) + v6 = f2(x16, -4*(x16 + x1 + x2 + x5)) + u1 = -f2(-v1, -4*(v2 + v3)) + u2 = -f2(-v4, -4*(v5 + v6)) + w1 = -2*f2(-u1, -4*u2) + return sqrt(sqrt(2)*sqrt(w1 + 4)/8 + S.Half) + + +def cos_table() -> dict[int, Callable[[], Expr]]: + r"""Lazily evaluated table for $\cos \frac{\pi}{n}$ in square roots for + $n \in \{3, 5, 17, 257, 65537\}$. + + Notes + ===== + + 65537 is the only other known Fermat prime and it is nearly impossible to + build in the current SymPy due to performance issues. + + References + ========== + + https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html + """ + return { + 3: cos_3, + 5: cos_5, + 17: cos_17, + 257: cos_257 + } diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/benchmarks/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/benchmarks/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/benchmarks/bench_exp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/benchmarks/bench_exp.py new file mode 100644 index 0000000000000000000000000000000000000000..fa18d29f87bcd249baec1d278a030fa7a133c3ba --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/benchmarks/bench_exp.py @@ -0,0 +1,11 @@ +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import exp + +x, y = symbols('x,y') + +e = exp(2*x) +q = exp(3*x) + + +def timeit_exp_subs(): + e.subs(q, y) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/complexes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/complexes.py new file mode 100644 index 0000000000000000000000000000000000000000..dd837e4e242057050370f38c4b4e9c26aa5d06c9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/complexes.py @@ -0,0 +1,1492 @@ +from __future__ import annotations + +from sympy.core import S, Add, Mul, sympify, Symbol, Dummy, Basic +from sympy.core.expr import Expr +from sympy.core.exprtools import factor_terms +from sympy.core.function import (DefinedFunction, Derivative, ArgumentIndexError, + AppliedUndef, expand_mul, PoleError) +from sympy.core.logic import fuzzy_not, fuzzy_or +from sympy.core.numbers import pi, I, oo +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise + +############################################################################### +######################### REAL and IMAGINARY PARTS ############################ +############################################################################### + + +class re(DefinedFunction): + """ + Returns real part of expression. This function performs only + elementary analysis and so it will fail to decompose properly + more complicated expressions. If completely simplified result + is needed then use ``Basic.as_real_imag()`` or perform complex + expansion on instance of this function. + + Examples + ======== + + >>> from sympy import re, im, I, E, symbols + >>> x, y = symbols('x y', real=True) + >>> re(2*E) + 2*E + >>> re(2*I + 17) + 17 + >>> re(2*I) + 0 + >>> re(im(x) + x*I + 2) + 2 + >>> re(5 + I + 2) + 7 + + Parameters + ========== + + arg : Expr + Real or complex expression. + + Returns + ======= + + expr : Expr + Real part of expression. + + See Also + ======== + + im + """ + + args: tuple[Expr] + + is_extended_real = True + unbranched = True # implicitly works on the projection to C + _singularities = True # non-holomorphic + + @classmethod + def eval(cls, arg): + if arg is S.NaN: + return S.NaN + elif arg is S.ComplexInfinity: + return S.NaN + elif arg.is_extended_real: + return arg + elif arg.is_imaginary or (I*arg).is_extended_real: + return S.Zero + elif arg.is_Matrix: + return arg.as_real_imag()[0] + elif arg.is_Function and isinstance(arg, conjugate): + return re(arg.args[0]) + else: + + included, reverted, excluded = [], [], [] + args = Add.make_args(arg) + for term in args: + coeff = term.as_coefficient(I) + + if coeff is not None: + if not coeff.is_extended_real: + reverted.append(coeff) + elif not term.has(I) and term.is_extended_real: + excluded.append(term) + else: + # Try to do some advanced expansion. If + # impossible, don't try to do re(arg) again + # (because this is what we are trying to do now). + real_imag = term.as_real_imag(ignore=arg) + if real_imag: + excluded.append(real_imag[0]) + else: + included.append(term) + + if len(args) != len(included): + a, b, c = (Add(*xs) for xs in [included, reverted, excluded]) + + return cls(a) - im(b) + c + + def as_real_imag(self, deep=True, **hints): + """ + Returns the real number with a zero imaginary part. + + """ + return (self, S.Zero) + + def _eval_derivative(self, x): + if x.is_extended_real or self.args[0].is_extended_real: + return re(Derivative(self.args[0], x, evaluate=True)) + if x.is_imaginary or self.args[0].is_imaginary: + return -I \ + * im(Derivative(self.args[0], x, evaluate=True)) + + def _eval_rewrite_as_im(self, arg, **kwargs): + return self.args[0] - I*im(self.args[0]) + + def _eval_is_algebraic(self): + return self.args[0].is_algebraic + + def _eval_is_zero(self): + # is_imaginary implies nonzero + return fuzzy_or([self.args[0].is_imaginary, self.args[0].is_zero]) + + def _eval_is_finite(self): + if self.args[0].is_finite: + return True + + def _eval_is_complex(self): + if self.args[0].is_finite: + return True + + +class im(DefinedFunction): + """ + Returns imaginary part of expression. This function performs only + elementary analysis and so it will fail to decompose properly more + complicated expressions. If completely simplified result is needed then + use ``Basic.as_real_imag()`` or perform complex expansion on instance of + this function. + + Examples + ======== + + >>> from sympy import re, im, E, I + >>> from sympy.abc import x, y + >>> im(2*E) + 0 + >>> im(2*I + 17) + 2 + >>> im(x*I) + re(x) + >>> im(re(x) + y) + im(y) + >>> im(2 + 3*I) + 3 + + Parameters + ========== + + arg : Expr + Real or complex expression. + + Returns + ======= + + expr : Expr + Imaginary part of expression. + + See Also + ======== + + re + """ + + args: tuple[Expr] + + is_extended_real = True + unbranched = True # implicitly works on the projection to C + _singularities = True # non-holomorphic + + @classmethod + def eval(cls, arg): + if arg is S.NaN: + return S.NaN + elif arg is S.ComplexInfinity: + return S.NaN + elif arg.is_extended_real: + return S.Zero + elif arg.is_imaginary or (I*arg).is_extended_real: + return -I * arg + elif arg.is_Matrix: + return arg.as_real_imag()[1] + elif arg.is_Function and isinstance(arg, conjugate): + return -im(arg.args[0]) + else: + included, reverted, excluded = [], [], [] + args = Add.make_args(arg) + for term in args: + coeff = term.as_coefficient(I) + + if coeff is not None: + if not coeff.is_extended_real: + reverted.append(coeff) + else: + excluded.append(coeff) + elif term.has(I) or not term.is_extended_real: + # Try to do some advanced expansion. If + # impossible, don't try to do im(arg) again + # (because this is what we are trying to do now). + real_imag = term.as_real_imag(ignore=arg) + if real_imag: + excluded.append(real_imag[1]) + else: + included.append(term) + + if len(args) != len(included): + a, b, c = (Add(*xs) for xs in [included, reverted, excluded]) + + return cls(a) + re(b) + c + + def as_real_imag(self, deep=True, **hints): + """ + Return the imaginary part with a zero real part. + + """ + return (self, S.Zero) + + def _eval_derivative(self, x): + if x.is_extended_real or self.args[0].is_extended_real: + return im(Derivative(self.args[0], x, evaluate=True)) + if x.is_imaginary or self.args[0].is_imaginary: + return -I \ + * re(Derivative(self.args[0], x, evaluate=True)) + + def _eval_rewrite_as_re(self, arg, **kwargs): + return -I*(self.args[0] - re(self.args[0])) + + def _eval_is_algebraic(self): + return self.args[0].is_algebraic + + def _eval_is_zero(self): + return self.args[0].is_extended_real + + def _eval_is_finite(self): + if self.args[0].is_finite: + return True + + def _eval_is_complex(self): + if self.args[0].is_finite: + return True + +############################################################################### +############### SIGN, ABSOLUTE VALUE, ARGUMENT and CONJUGATION ################ +############################################################################### + +class sign(DefinedFunction): + """ + Returns the complex sign of an expression: + + Explanation + =========== + + If the expression is real the sign will be: + + * $1$ if expression is positive + * $0$ if expression is equal to zero + * $-1$ if expression is negative + + If the expression is imaginary the sign will be: + + * $I$ if im(expression) is positive + * $-I$ if im(expression) is negative + + Otherwise an unevaluated expression will be returned. When evaluated, the + result (in general) will be ``cos(arg(expr)) + I*sin(arg(expr))``. + + Examples + ======== + + >>> from sympy import sign, I + + >>> sign(-1) + -1 + >>> sign(0) + 0 + >>> sign(-3*I) + -I + >>> sign(1 + I) + sign(1 + I) + >>> _.evalf() + 0.707106781186548 + 0.707106781186548*I + + Parameters + ========== + + arg : Expr + Real or imaginary expression. + + Returns + ======= + + expr : Expr + Complex sign of expression. + + See Also + ======== + + Abs, conjugate + """ + + is_complex = True + _singularities = True + + def doit(self, **hints): + s = super().doit() + if s == self and self.args[0].is_zero is False: + return self.args[0] / Abs(self.args[0]) + return s + + @classmethod + def eval(cls, arg): + # handle what we can + if arg.is_Mul: + c, args = arg.as_coeff_mul() + unk = [] + s = sign(c) + for a in args: + if a.is_extended_negative: + s = -s + elif a.is_extended_positive: + pass + else: + if a.is_imaginary: + ai = im(a) + if ai.is_comparable: # i.e. a = I*real + s *= I + if ai.is_extended_negative: + # can't use sign(ai) here since ai might not be + # a Number + s = -s + else: + unk.append(a) + else: + unk.append(a) + if c is S.One and len(unk) == len(args): + return None + return s * cls(arg._new_rawargs(*unk)) + if arg is S.NaN: + return S.NaN + if arg.is_zero: # it may be an Expr that is zero + return S.Zero + if arg.is_extended_positive: + return S.One + if arg.is_extended_negative: + return S.NegativeOne + if arg.is_Function: + if isinstance(arg, sign): + return arg + if arg.is_imaginary: + if arg.is_Pow and arg.exp is S.Half: + # we catch this because non-trivial sqrt args are not expanded + # e.g. sqrt(1-sqrt(2)) --x--> to I*sqrt(sqrt(2) - 1) + return I + arg2 = -I * arg + if arg2.is_extended_positive: + return I + if arg2.is_extended_negative: + return -I + + def _eval_Abs(self): + if fuzzy_not(self.args[0].is_zero): + return S.One + + def _eval_conjugate(self): + return sign(conjugate(self.args[0])) + + def _eval_derivative(self, x): + if self.args[0].is_extended_real: + from sympy.functions.special.delta_functions import DiracDelta + return 2 * Derivative(self.args[0], x, evaluate=True) \ + * DiracDelta(self.args[0]) + elif self.args[0].is_imaginary: + from sympy.functions.special.delta_functions import DiracDelta + return 2 * Derivative(self.args[0], x, evaluate=True) \ + * DiracDelta(-I * self.args[0]) + + def _eval_is_nonnegative(self): + if self.args[0].is_nonnegative: + return True + + def _eval_is_nonpositive(self): + if self.args[0].is_nonpositive: + return True + + def _eval_is_imaginary(self): + return self.args[0].is_imaginary + + def _eval_is_integer(self): + return self.args[0].is_extended_real + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_power(self, other): + if ( + fuzzy_not(self.args[0].is_zero) and + other.is_integer and + other.is_even + ): + return S.One + + def _eval_nseries(self, x, n, logx, cdir=0): + arg0 = self.args[0] + x0 = arg0.subs(x, 0) + if x0 != 0: + return self.func(x0) + if cdir != 0: + cdir = arg0.dir(x, cdir) + return -S.One if re(cdir) < 0 else S.One + + def _eval_rewrite_as_Piecewise(self, arg, **kwargs): + if arg.is_extended_real: + return Piecewise((1, arg > 0), (-1, arg < 0), (0, True)) + + def _eval_rewrite_as_Heaviside(self, arg, **kwargs): + from sympy.functions.special.delta_functions import Heaviside + if arg.is_extended_real: + return Heaviside(arg) * 2 - 1 + + def _eval_rewrite_as_Abs(self, arg, **kwargs): + return Piecewise((0, Eq(arg, 0)), (arg / Abs(arg), True)) + + def _eval_simplify(self, **kwargs): + return self.func(factor_terms(self.args[0])) # XXX include doit? + + +class Abs(DefinedFunction): + """ + Return the absolute value of the argument. + + Explanation + =========== + + This is an extension of the built-in function ``abs()`` to accept symbolic + values. If you pass a SymPy expression to the built-in ``abs()``, it will + pass it automatically to ``Abs()``. + + Examples + ======== + + >>> from sympy import Abs, Symbol, S, I + >>> Abs(-1) + 1 + >>> x = Symbol('x', real=True) + >>> Abs(-x) + Abs(x) + >>> Abs(x**2) + x**2 + >>> abs(-x) # The Python built-in + Abs(x) + >>> Abs(3*x + 2*I) + sqrt(9*x**2 + 4) + >>> Abs(8*I) + 8 + + Note that the Python built-in will return either an Expr or int depending on + the argument:: + + >>> type(abs(-1)) + <... 'int'> + >>> type(abs(S.NegativeOne)) + + + Abs will always return a SymPy object. + + Parameters + ========== + + arg : Expr + Real or complex expression. + + Returns + ======= + + expr : Expr + Absolute value returned can be an expression or integer depending on + input arg. + + See Also + ======== + + sign, conjugate + """ + + args: tuple[Expr] + + is_extended_real = True + is_extended_negative = False + is_extended_nonnegative = True + unbranched = True + _singularities = True # non-holomorphic + + def fdiff(self, argindex=1): + """ + Get the first derivative of the argument to Abs(). + + """ + if argindex == 1: + return sign(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + from sympy.simplify.simplify import signsimp + + if hasattr(arg, '_eval_Abs'): + obj = arg._eval_Abs() + if obj is not None: + return obj + if not isinstance(arg, Expr): + raise TypeError("Bad argument type for Abs(): %s" % type(arg)) + + # handle what we can + arg = signsimp(arg, evaluate=False) + n, d = arg.as_numer_denom() + if d.free_symbols and not n.free_symbols: + return cls(n)/cls(d) + + if arg.is_Mul: + known = [] + unk = [] + for t in arg.args: + if t.is_Pow and t.exp.is_integer and t.exp.is_negative: + bnew = cls(t.base) + if isinstance(bnew, cls): + unk.append(t) + else: + known.append(Pow(bnew, t.exp)) + else: + tnew = cls(t) + if isinstance(tnew, cls): + unk.append(t) + else: + known.append(tnew) + known = Mul(*known) + unk = cls(Mul(*unk), evaluate=False) if unk else S.One + return known*unk + if arg is S.NaN: + return S.NaN + if arg is S.ComplexInfinity: + return oo + from sympy.functions.elementary.exponential import exp, log + + if arg.is_Pow: + base, exponent = arg.as_base_exp() + if base.is_extended_real: + if exponent.is_integer: + if exponent.is_even: + return arg + if base is S.NegativeOne: + return S.One + return Abs(base)**exponent + if base.is_extended_nonnegative: + return base**re(exponent) + if base.is_extended_negative: + return (-base)**re(exponent)*exp(-pi*im(exponent)) + return + elif not base.has(Symbol): # complex base + # express base**exponent as exp(exponent*log(base)) + a, b = log(base).as_real_imag() + z = a + I*b + return exp(re(exponent*z)) + if isinstance(arg, exp): + return exp(re(arg.args[0])) + if isinstance(arg, AppliedUndef): + if arg.is_positive: + return arg + elif arg.is_negative: + return -arg + return + if arg.is_Add and arg.has(oo, S.NegativeInfinity): + if any(a.is_infinite for a in arg.as_real_imag()): + return oo + if arg.is_zero: + return S.Zero + if arg.is_extended_nonnegative: + return arg + if arg.is_extended_nonpositive: + return -arg + if arg.is_imaginary: + arg2 = -I * arg + if arg2.is_extended_nonnegative: + return arg2 + if arg.is_extended_real: + return + # reject result if all new conjugates are just wrappers around + # an expression that was already in the arg + conj = signsimp(arg.conjugate(), evaluate=False) + new_conj = conj.atoms(conjugate) - arg.atoms(conjugate) + if new_conj and all(arg.has(i.args[0]) for i in new_conj): + return + if arg != conj and arg != -conj: + ignore = arg.atoms(Abs) + abs_free_arg = arg.xreplace({i: Dummy(real=True) for i in ignore}) + unk = [a for a in abs_free_arg.free_symbols if a.is_extended_real is None] + if not unk or not all(conj.has(conjugate(u)) for u in unk): + return sqrt(expand_mul(arg*conj)) + + def _eval_is_real(self): + if self.args[0].is_finite: + return True + + def _eval_is_integer(self): + if self.args[0].is_extended_real: + return self.args[0].is_integer + + def _eval_is_extended_nonzero(self): + return fuzzy_not(self._args[0].is_zero) + + def _eval_is_zero(self): + return self._args[0].is_zero + + def _eval_is_extended_positive(self): + return fuzzy_not(self._args[0].is_zero) + + def _eval_is_rational(self): + if self.args[0].is_extended_real: + return self.args[0].is_rational + + def _eval_is_even(self): + if self.args[0].is_extended_real: + return self.args[0].is_even + + def _eval_is_odd(self): + if self.args[0].is_extended_real: + return self.args[0].is_odd + + def _eval_is_algebraic(self): + return self.args[0].is_algebraic + + def _eval_power(self, exponent): + if self.args[0].is_extended_real and exponent.is_integer: + if exponent.is_even: + return self.args[0]**exponent + elif exponent is not S.NegativeOne and exponent.is_Integer: + return self.args[0]**(exponent - 1)*self + return + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.functions.elementary.exponential import log + direction = self.args[0].leadterm(x)[0] + if direction.has(log(x)): + direction = direction.subs(log(x), logx) + s = self.args[0]._eval_nseries(x, n=n, logx=logx) + return (sign(direction)*s).expand() + + def _eval_derivative(self, x): + if self.args[0].is_extended_real or self.args[0].is_imaginary: + return Derivative(self.args[0], x, evaluate=True) \ + * sign(conjugate(self.args[0])) + rv = (re(self.args[0]) * Derivative(re(self.args[0]), x, + evaluate=True) + im(self.args[0]) * Derivative(im(self.args[0]), + x, evaluate=True)) / Abs(self.args[0]) + return rv.rewrite(sign) + + def _eval_rewrite_as_Heaviside(self, arg, **kwargs): + # Note this only holds for real arg (since Heaviside is not defined + # for complex arguments). + from sympy.functions.special.delta_functions import Heaviside + if arg.is_extended_real: + return arg*(Heaviside(arg) - Heaviside(-arg)) + + def _eval_rewrite_as_Piecewise(self, arg, **kwargs): + if arg.is_extended_real: + return Piecewise((arg, arg >= 0), (-arg, True)) + elif arg.is_imaginary: + return Piecewise((I*arg, I*arg >= 0), (-I*arg, True)) + + def _eval_rewrite_as_sign(self, arg, **kwargs): + return arg/sign(arg) + + def _eval_rewrite_as_conjugate(self, arg, **kwargs): + return sqrt(arg*conjugate(arg)) + + +class arg(DefinedFunction): + r""" + Returns the argument (in radians) of a complex number. The argument is + evaluated in consistent convention with ``atan2`` where the branch-cut is + taken along the negative real axis and ``arg(z)`` is in the interval + $(-\pi,\pi]$. For a positive number, the argument is always 0; the + argument of a negative number is $\pi$; and the argument of 0 + is undefined and returns ``nan``. So the ``arg`` function will never nest + greater than 3 levels since at the 4th application, the result must be + nan; for a real number, nan is returned on the 3rd application. + + Examples + ======== + + >>> from sympy import arg, I, sqrt, Dummy + >>> from sympy.abc import x + >>> arg(2.0) + 0 + >>> arg(I) + pi/2 + >>> arg(sqrt(2) + I*sqrt(2)) + pi/4 + >>> arg(sqrt(3)/2 + I/2) + pi/6 + >>> arg(4 + 3*I) + atan(3/4) + >>> arg(0.8 + 0.6*I) + 0.643501108793284 + >>> arg(arg(arg(arg(x)))) + nan + >>> real = Dummy(real=True) + >>> arg(arg(arg(real))) + nan + + Parameters + ========== + + arg : Expr + Real or complex expression. + + Returns + ======= + + value : Expr + Returns arc tangent of arg measured in radians. + + """ + + is_extended_real = True + is_real = True + is_finite = True + _singularities = True # non-holomorphic + + @classmethod + def eval(cls, arg): + a = arg + for i in range(3): + if isinstance(a, cls): + a = a.args[0] + else: + if i == 2 and a.is_extended_real: + return S.NaN + break + else: + return S.NaN + from sympy.functions.elementary.exponential import exp, exp_polar + if isinstance(arg, exp_polar): + return periodic_argument(arg, oo) + elif isinstance(arg, exp): + i_ = im(arg.args[0]) + if i_.is_comparable: + i_ %= 2*S.Pi + if i_ > S.Pi: + i_ -= 2*S.Pi + return i_ + + if not arg.is_Atom: + c, arg_ = factor_terms(arg).as_coeff_Mul() + if arg_.is_Mul: + arg_ = Mul(*[a if (sign(a) not in (-1, 1)) else + sign(a) for a in arg_.args]) + arg_ = sign(c)*arg_ + else: + arg_ = arg + if any(i.is_extended_positive is None for i in arg_.atoms(AppliedUndef)): + return + from sympy.functions.elementary.trigonometric import atan2 + x, y = arg_.as_real_imag() + rv = atan2(y, x) + if rv.is_number: + return rv + if arg_ != arg: + return cls(arg_, evaluate=False) + + def _eval_derivative(self, t): + x, y = self.args[0].as_real_imag() + return (x * Derivative(y, t, evaluate=True) - y * + Derivative(x, t, evaluate=True)) / (x**2 + y**2) + + def _eval_rewrite_as_atan2(self, arg, **kwargs): + from sympy.functions.elementary.trigonometric import atan2 + x, y = self.args[0].as_real_imag() + return atan2(y, x) + + def _eval_as_leading_term(self, x, logx, cdir): + arg0 = self.args[0] + t = Dummy('t', positive=True) + if cdir == 0: + cdir = 1 + z = arg0.subs(x, cdir*t) + if z.is_positive: + return S.Zero + elif z.is_negative: + return S.Pi + else: + raise PoleError("Cannot expand %s around 0" % (self)) + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.series.order import Order + if n <= 0: + return Order(1) + return self._eval_as_leading_term(x, logx=logx, cdir=cdir) + + +class conjugate(DefinedFunction): + """ + Returns the *complex conjugate* [1]_ of an argument. + In mathematics, the complex conjugate of a complex number + is given by changing the sign of the imaginary part. + + Thus, the conjugate of the complex number + :math:`a + ib` (where $a$ and $b$ are real numbers) is :math:`a - ib` + + Examples + ======== + + >>> from sympy import conjugate, I + >>> conjugate(2) + 2 + >>> conjugate(I) + -I + >>> conjugate(3 + 2*I) + 3 - 2*I + >>> conjugate(5 - I) + 5 + I + + Parameters + ========== + + arg : Expr + Real or complex expression. + + Returns + ======= + + arg : Expr + Complex conjugate of arg as real, imaginary or mixed expression. + + See Also + ======== + + sign, Abs + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Complex_conjugation + """ + _singularities = True # non-holomorphic + + @classmethod + def eval(cls, arg): + obj = arg._eval_conjugate() + if obj is not None: + return obj + + def inverse(self): + return conjugate + + def _eval_Abs(self): + return Abs(self.args[0], evaluate=True) + + def _eval_adjoint(self): + return transpose(self.args[0]) + + def _eval_conjugate(self): + return self.args[0] + + def _eval_derivative(self, x): + if x.is_real: + return conjugate(Derivative(self.args[0], x, evaluate=True)) + elif x.is_imaginary: + return -conjugate(Derivative(self.args[0], x, evaluate=True)) + + def _eval_transpose(self): + return adjoint(self.args[0]) + + def _eval_is_algebraic(self): + return self.args[0].is_algebraic + + +class transpose(DefinedFunction): + """ + Linear map transposition. + + Examples + ======== + + >>> from sympy import transpose, Matrix, MatrixSymbol + >>> A = MatrixSymbol('A', 25, 9) + >>> transpose(A) + A.T + >>> B = MatrixSymbol('B', 9, 22) + >>> transpose(B) + B.T + >>> transpose(A*B) + B.T*A.T + >>> M = Matrix([[4, 5], [2, 1], [90, 12]]) + >>> M + Matrix([ + [ 4, 5], + [ 2, 1], + [90, 12]]) + >>> transpose(M) + Matrix([ + [4, 2, 90], + [5, 1, 12]]) + + Parameters + ========== + + arg : Matrix + Matrix or matrix expression to take the transpose of. + + Returns + ======= + + value : Matrix + Transpose of arg. + + """ + + @classmethod + def eval(cls, arg): + obj = arg._eval_transpose() + if obj is not None: + return obj + + def _eval_adjoint(self): + return conjugate(self.args[0]) + + def _eval_conjugate(self): + return adjoint(self.args[0]) + + def _eval_transpose(self): + return self.args[0] + + +class adjoint(DefinedFunction): + """ + Conjugate transpose or Hermite conjugation. + + Examples + ======== + + >>> from sympy import adjoint, MatrixSymbol + >>> A = MatrixSymbol('A', 10, 5) + >>> adjoint(A) + Adjoint(A) + + Parameters + ========== + + arg : Matrix + Matrix or matrix expression to take the adjoint of. + + Returns + ======= + + value : Matrix + Represents the conjugate transpose or Hermite + conjugation of arg. + + """ + + @classmethod + def eval(cls, arg): + obj = arg._eval_adjoint() + if obj is not None: + return obj + obj = arg._eval_transpose() + if obj is not None: + return conjugate(obj) + + def _eval_adjoint(self): + return self.args[0] + + def _eval_conjugate(self): + return transpose(self.args[0]) + + def _eval_transpose(self): + return conjugate(self.args[0]) + + def _latex(self, printer, exp=None, *args): + arg = printer._print(self.args[0]) + tex = r'%s^{\dagger}' % arg + if exp: + tex = r'\left(%s\right)^{%s}' % (tex, exp) + return tex + + def _pretty(self, printer, *args): + from sympy.printing.pretty.stringpict import prettyForm + pform = printer._print(self.args[0], *args) + if printer._use_unicode: + pform = pform**prettyForm('\N{DAGGER}') + else: + pform = pform**prettyForm('+') + return pform + +############################################################################### +############### HANDLING OF POLAR NUMBERS ##################################### +############################################################################### + + +class polar_lift(DefinedFunction): + """ + Lift argument to the Riemann surface of the logarithm, using the + standard branch. + + Examples + ======== + + >>> from sympy import Symbol, polar_lift, I + >>> p = Symbol('p', polar=True) + >>> x = Symbol('x') + >>> polar_lift(4) + 4*exp_polar(0) + >>> polar_lift(-4) + 4*exp_polar(I*pi) + >>> polar_lift(-I) + exp_polar(-I*pi/2) + >>> polar_lift(I + 2) + polar_lift(2 + I) + + >>> polar_lift(4*x) + 4*polar_lift(x) + >>> polar_lift(4*p) + 4*p + + Parameters + ========== + + arg : Expr + Real or complex expression. + + See Also + ======== + + sympy.functions.elementary.exponential.exp_polar + periodic_argument + """ + + is_polar = True + is_comparable = False # Cannot be evalf'd. + + @classmethod + def eval(cls, arg): + from sympy.functions.elementary.complexes import arg as argument + if arg.is_number: + ar = argument(arg) + # In general we want to affirm that something is known, + # e.g. `not ar.has(argument) and not ar.has(atan)` + # but for now we will just be more restrictive and + # see that it has evaluated to one of the known values. + if ar in (0, pi/2, -pi/2, pi): + from sympy.functions.elementary.exponential import exp_polar + return exp_polar(I*ar)*abs(arg) + + if arg.is_Mul: + args = arg.args + else: + args = [arg] + included = [] + excluded = [] + positive = [] + for arg in args: + if arg.is_polar: + included += [arg] + elif arg.is_positive: + positive += [arg] + else: + excluded += [arg] + if len(excluded) < len(args): + if excluded: + return Mul(*(included + positive))*polar_lift(Mul(*excluded)) + elif included: + return Mul(*(included + positive)) + else: + from sympy.functions.elementary.exponential import exp_polar + return Mul(*positive)*exp_polar(0) + + def _eval_evalf(self, prec): + """ Careful! any evalf of polar numbers is flaky """ + return self.args[0]._eval_evalf(prec) + + def _eval_Abs(self): + return Abs(self.args[0], evaluate=True) + + +class periodic_argument(DefinedFunction): + r""" + Represent the argument on a quotient of the Riemann surface of the + logarithm. That is, given a period $P$, always return a value in + $(-P/2, P/2]$, by using $\exp(PI) = 1$. + + Examples + ======== + + >>> from sympy import exp_polar, periodic_argument + >>> from sympy import I, pi + >>> periodic_argument(exp_polar(10*I*pi), 2*pi) + 0 + >>> periodic_argument(exp_polar(5*I*pi), 4*pi) + pi + >>> from sympy import exp_polar, periodic_argument + >>> from sympy import I, pi + >>> periodic_argument(exp_polar(5*I*pi), 2*pi) + pi + >>> periodic_argument(exp_polar(5*I*pi), 3*pi) + -pi + >>> periodic_argument(exp_polar(5*I*pi), pi) + 0 + + Parameters + ========== + + ar : Expr + A polar number. + + period : Expr + The period $P$. + + See Also + ======== + + sympy.functions.elementary.exponential.exp_polar + polar_lift : Lift argument to the Riemann surface of the logarithm + principal_branch + """ + + @classmethod + def _getunbranched(cls, ar): + from sympy.functions.elementary.exponential import exp_polar, log + if ar.is_Mul: + args = ar.args + else: + args = [ar] + unbranched = 0 + for a in args: + if not a.is_polar: + unbranched += arg(a) + elif isinstance(a, exp_polar): + unbranched += a.exp.as_real_imag()[1] + elif a.is_Pow: + re, im = a.exp.as_real_imag() + unbranched += re*unbranched_argument( + a.base) + im*log(abs(a.base)) + elif isinstance(a, polar_lift): + unbranched += arg(a.args[0]) + else: + return None + return unbranched + + @classmethod + def eval(cls, ar, period): + # Our strategy is to evaluate the argument on the Riemann surface of the + # logarithm, and then reduce. + # NOTE evidently this means it is a rather bad idea to use this with + # period != 2*pi and non-polar numbers. + if not period.is_extended_positive: + return None + if period == oo and isinstance(ar, principal_branch): + return periodic_argument(*ar.args) + if isinstance(ar, polar_lift) and period >= 2*pi: + return periodic_argument(ar.args[0], period) + if ar.is_Mul: + newargs = [x for x in ar.args if not x.is_positive] + if len(newargs) != len(ar.args): + return periodic_argument(Mul(*newargs), period) + unbranched = cls._getunbranched(ar) + if unbranched is None: + return None + from sympy.functions.elementary.trigonometric import atan, atan2 + if unbranched.has(periodic_argument, atan2, atan): + return None + if period == oo: + return unbranched + if period != oo: + from sympy.functions.elementary.integers import ceiling + n = ceiling(unbranched/period - S.Half)*period + if not n.has(ceiling): + return unbranched - n + + def _eval_evalf(self, prec): + z, period = self.args + if period == oo: + unbranched = periodic_argument._getunbranched(z) + if unbranched is None: + return self + return unbranched._eval_evalf(prec) + ub = periodic_argument(z, oo)._eval_evalf(prec) + from sympy.functions.elementary.integers import ceiling + return (ub - ceiling(ub/period - S.Half)*period)._eval_evalf(prec) + + +def unbranched_argument(arg): + ''' + Returns periodic argument of arg with period as infinity. + + Examples + ======== + + >>> from sympy import exp_polar, unbranched_argument + >>> from sympy import I, pi + >>> unbranched_argument(exp_polar(15*I*pi)) + 15*pi + >>> unbranched_argument(exp_polar(7*I*pi)) + 7*pi + + See also + ======== + + periodic_argument + ''' + return periodic_argument(arg, oo) + + +class principal_branch(DefinedFunction): + """ + Represent a polar number reduced to its principal branch on a quotient + of the Riemann surface of the logarithm. + + Explanation + =========== + + This is a function of two arguments. The first argument is a polar + number `z`, and the second one a positive real number or infinity, `p`. + The result is ``z mod exp_polar(I*p)``. + + Examples + ======== + + >>> from sympy import exp_polar, principal_branch, oo, I, pi + >>> from sympy.abc import z + >>> principal_branch(z, oo) + z + >>> principal_branch(exp_polar(2*pi*I)*3, 2*pi) + 3*exp_polar(0) + >>> principal_branch(exp_polar(2*pi*I)*3*z, 2*pi) + 3*principal_branch(z, 2*pi) + + Parameters + ========== + + x : Expr + A polar number. + + period : Expr + Positive real number or infinity. + + See Also + ======== + + sympy.functions.elementary.exponential.exp_polar + polar_lift : Lift argument to the Riemann surface of the logarithm + periodic_argument + """ + + is_polar = True + is_comparable = False # cannot always be evalf'd + + @classmethod + def eval(self, x, period): + from sympy.functions.elementary.exponential import exp_polar + if isinstance(x, polar_lift): + return principal_branch(x.args[0], period) + if period == oo: + return x + ub = periodic_argument(x, oo) + barg = periodic_argument(x, period) + if ub != barg and not ub.has(periodic_argument) \ + and not barg.has(periodic_argument): + pl = polar_lift(x) + + def mr(expr): + if not isinstance(expr, Symbol): + return polar_lift(expr) + return expr + pl = pl.replace(polar_lift, mr) + # Recompute unbranched argument + ub = periodic_argument(pl, oo) + if not pl.has(polar_lift): + if ub != barg: + res = exp_polar(I*(barg - ub))*pl + else: + res = pl + if not res.is_polar and not res.has(exp_polar): + res *= exp_polar(0) + return res + + if not x.free_symbols: + c, m = x, () + else: + c, m = x.as_coeff_mul(*x.free_symbols) + others = [] + for y in m: + if y.is_positive: + c *= y + else: + others += [y] + m = tuple(others) + arg = periodic_argument(c, period) + if arg.has(periodic_argument): + return None + if arg.is_number and (unbranched_argument(c) != arg or + (arg == 0 and m != () and c != 1)): + if arg == 0: + return abs(c)*principal_branch(Mul(*m), period) + return principal_branch(exp_polar(I*arg)*Mul(*m), period)*abs(c) + if arg.is_number and ((abs(arg) < period/2) == True or arg == period/2) \ + and m == (): + return exp_polar(arg*I)*abs(c) + + def _eval_evalf(self, prec): + z, period = self.args + p = periodic_argument(z, period)._eval_evalf(prec) + if abs(p) > pi or p == -pi: + return self # Cannot evalf for this argument. + from sympy.functions.elementary.exponential import exp + return (abs(z)*exp(I*p))._eval_evalf(prec) + + +def _polarify(eq, lift, pause=False): + from sympy.integrals.integrals import Integral + if eq.is_polar: + return eq + if eq.is_number and not pause: + return polar_lift(eq) + if isinstance(eq, Symbol) and not pause and lift: + return polar_lift(eq) + elif eq.is_Atom: + return eq + elif eq.is_Add: + r = eq.func(*[_polarify(arg, lift, pause=True) for arg in eq.args]) + if lift: + return polar_lift(r) + return r + elif eq.is_Pow and eq.base == S.Exp1: + return eq.func(S.Exp1, _polarify(eq.exp, lift, pause=False)) + elif eq.is_Function: + return eq.func(*[_polarify(arg, lift, pause=False) for arg in eq.args]) + elif isinstance(eq, Integral): + # Don't lift the integration variable + func = _polarify(eq.function, lift, pause=pause) + limits = [] + for limit in eq.args[1:]: + var = _polarify(limit[0], lift=False, pause=pause) + rest = _polarify(limit[1:], lift=lift, pause=pause) + limits.append((var,) + rest) + return Integral(*((func,) + tuple(limits))) + else: + return eq.func(*[_polarify(arg, lift, pause=pause) + if isinstance(arg, Expr) else arg for arg in eq.args]) + + +def polarify(eq, subs=True, lift=False): + """ + Turn all numbers in eq into their polar equivalents (under the standard + choice of argument). + + Note that no attempt is made to guess a formal convention of adding + polar numbers, expressions like $1 + x$ will generally not be altered. + + Note also that this function does not promote ``exp(x)`` to ``exp_polar(x)``. + + If ``subs`` is ``True``, all symbols which are not already polar will be + substituted for polar dummies; in this case the function behaves much + like :func:`~.posify`. + + If ``lift`` is ``True``, both addition statements and non-polar symbols are + changed to their ``polar_lift()``ed versions. + Note that ``lift=True`` implies ``subs=False``. + + Examples + ======== + + >>> from sympy import polarify, sin, I + >>> from sympy.abc import x, y + >>> expr = (-x)**y + >>> expr.expand() + (-x)**y + >>> polarify(expr) + ((_x*exp_polar(I*pi))**_y, {_x: x, _y: y}) + >>> polarify(expr)[0].expand() + _x**_y*exp_polar(_y*I*pi) + >>> polarify(x, lift=True) + polar_lift(x) + >>> polarify(x*(1+y), lift=True) + polar_lift(x)*polar_lift(y + 1) + + Adds are treated carefully: + + >>> polarify(1 + sin((1 + I)*x)) + (sin(_x*polar_lift(1 + I)) + 1, {_x: x}) + """ + if lift: + subs = False + eq = _polarify(sympify(eq), lift) + if not subs: + return eq + reps = {s: Dummy(s.name, polar=True) for s in eq.free_symbols} + eq = eq.subs(reps) + return eq, {r: s for s, r in reps.items()} + + +def _unpolarify(eq, exponents_only, pause=False): + if not isinstance(eq, Basic) or eq.is_Atom: + return eq + + if not pause: + from sympy.functions.elementary.exponential import exp, exp_polar + if isinstance(eq, exp_polar): + return exp(_unpolarify(eq.exp, exponents_only)) + if isinstance(eq, principal_branch) and eq.args[1] == 2*pi: + return _unpolarify(eq.args[0], exponents_only) + if ( + eq.is_Add or eq.is_Mul or eq.is_Boolean or + eq.is_Relational and ( + eq.rel_op in ('==', '!=') and 0 in eq.args or + eq.rel_op not in ('==', '!=')) + ): + return eq.func(*[_unpolarify(x, exponents_only) for x in eq.args]) + if isinstance(eq, polar_lift): + return _unpolarify(eq.args[0], exponents_only) + + if eq.is_Pow: + expo = _unpolarify(eq.exp, exponents_only) + base = _unpolarify(eq.base, exponents_only, + not (expo.is_integer and not pause)) + return base**expo + + if eq.is_Function and getattr(eq.func, 'unbranched', False): + return eq.func(*[_unpolarify(x, exponents_only, exponents_only) + for x in eq.args]) + + return eq.func(*[_unpolarify(x, exponents_only, True) for x in eq.args]) + + +def unpolarify(eq, subs=None, exponents_only=False): + """ + If `p` denotes the projection from the Riemann surface of the logarithm to + the complex line, return a simplified version `eq'` of `eq` such that + `p(eq') = p(eq)`. + Also apply the substitution subs in the end. (This is a convenience, since + ``unpolarify``, in a certain sense, undoes :func:`polarify`.) + + Examples + ======== + + >>> from sympy import unpolarify, polar_lift, sin, I + >>> unpolarify(polar_lift(I + 2)) + 2 + I + >>> unpolarify(sin(polar_lift(I + 7))) + sin(7 + I) + """ + if isinstance(eq, bool): + return eq + + eq = sympify(eq) + if subs is not None: + return unpolarify(eq.subs(subs)) + changed = True + pause = False + if exponents_only: + pause = True + while changed: + changed = False + res = _unpolarify(eq, exponents_only, pause) + if res != eq: + changed = True + eq = res + if isinstance(res, bool): + return res + # Finally, replacing Exp(0) by 1 is always correct. + # So is polar_lift(0) -> 0. + from sympy.functions.elementary.exponential import exp_polar + return res.subs({exp_polar(0): 1, polar_lift(0): 0}) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/exponential.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/exponential.py new file mode 100644 index 0000000000000000000000000000000000000000..2bb0333cb34a35a96248c12a4640e848986f2feb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/exponential.py @@ -0,0 +1,1286 @@ +from __future__ import annotations +from itertools import product + +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.expr import Expr +from sympy.core.function import (DefinedFunction, ArgumentIndexError, expand_log, + expand_mul, FunctionClass, PoleError, expand_multinomial, expand_complex) +from sympy.core.logic import fuzzy_and, fuzzy_not, fuzzy_or +from sympy.core.mul import Mul +from sympy.core.numbers import Integer, Rational, pi, I +from sympy.core.parameters import global_parameters +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Wild, Dummy +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import arg, unpolarify, im, re, Abs +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.ntheory import multiplicity, perfect_power +from sympy.ntheory.factor_ import factorint + +# NOTE IMPORTANT +# The series expansion code in this file is an important part of the gruntz +# algorithm for determining limits. _eval_nseries has to return a generalized +# power series with coefficients in C(log(x), log). +# In more detail, the result of _eval_nseries(self, x, n) must be +# c_0*x**e_0 + ... (finitely many terms) +# where e_i are numbers (not necessarily integers) and c_i involve only +# numbers, the function log, and log(x). [This also means it must not contain +# log(x(1+p)), this *has* to be expanded to log(x)+log(1+p) if x.is_positive and +# p.is_positive.] + + +class ExpBase(DefinedFunction): + + unbranched = True + _singularities = (S.ComplexInfinity,) + + @property + def kind(self): + return self.exp.kind + + def inverse(self, argindex=1): + """ + Returns the inverse function of ``exp(x)``. + """ + return log + + def as_numer_denom(self): + """ + Returns this with a positive exponent as a 2-tuple (a fraction). + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x + >>> exp(-x).as_numer_denom() + (1, exp(x)) + >>> exp(x).as_numer_denom() + (exp(x), 1) + """ + # this should be the same as Pow.as_numer_denom wrt + # exponent handling + if not self.is_commutative: + return self, S.One + exp = self.exp + neg_exp = exp.is_negative + if not neg_exp and not (-exp).is_negative: + neg_exp = exp.could_extract_minus_sign() + if neg_exp: + return S.One, self.func(-exp) + return self, S.One + + @property + def exp(self): + """ + Returns the exponent of the function. + """ + return self.args[0] + + def as_base_exp(self): + """ + Returns the 2-tuple (base, exponent). + """ + return self.func(1), Mul(*self.args) + + def _eval_adjoint(self): + return self.func(self.exp.adjoint()) + + def _eval_conjugate(self): + return self.func(self.exp.conjugate()) + + def _eval_transpose(self): + return self.func(self.exp.transpose()) + + def _eval_is_finite(self): + arg = self.exp + if arg.is_infinite: + if arg.is_extended_negative: + return True + if arg.is_extended_positive: + return False + if arg.is_finite: + return True + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + z = s.exp.is_zero + if z: + return True + elif s.exp.is_rational and fuzzy_not(z): + return False + else: + return s.is_rational + + def _eval_is_zero(self): + return self.exp is S.NegativeInfinity + + def _eval_power(self, other): + """exp(arg)**e -> exp(arg*e) if assumptions allow it. + """ + b, e = self.as_base_exp() + return Pow._eval_power(Pow(b, e, evaluate=False), other) + + def _eval_expand_power_exp(self, **hints): + from sympy.concrete.products import Product + from sympy.concrete.summations import Sum + arg = self.args[0] + if arg.is_Add and arg.is_commutative: + return Mul.fromiter(self.func(x) for x in arg.args) + elif isinstance(arg, Sum) and arg.is_commutative: + return Product(self.func(arg.function), *arg.limits) + return self.func(arg) + + +class exp_polar(ExpBase): + r""" + Represent a *polar number* (see g-function Sphinx documentation). + + Explanation + =========== + + ``exp_polar`` represents the function + `Exp: \mathbb{C} \rightarrow \mathcal{S}`, sending the complex number + `z = a + bi` to the polar number `r = exp(a), \theta = b`. It is one of + the main functions to construct polar numbers. + + Examples + ======== + + >>> from sympy import exp_polar, pi, I, exp + + The main difference is that polar numbers do not "wrap around" at `2 \pi`: + + >>> exp(2*pi*I) + 1 + >>> exp_polar(2*pi*I) + exp_polar(2*I*pi) + + apart from that they behave mostly like classical complex numbers: + + >>> exp_polar(2)*exp_polar(3) + exp_polar(5) + + See Also + ======== + + sympy.simplify.powsimp.powsimp + polar_lift + periodic_argument + principal_branch + """ + + is_polar = True + is_comparable = False # cannot be evalf'd + + def _eval_Abs(self): # Abs is never a polar number + return exp(re(self.args[0])) + + def _eval_evalf(self, prec): + """ Careful! any evalf of polar numbers is flaky """ + i = im(self.args[0]) + try: + bad = (i <= -pi or i > pi) + except TypeError: + bad = True + if bad: + return self # cannot evalf for this argument + res = exp(self.args[0])._eval_evalf(prec) + if i > 0 and im(res) < 0: + # i ~ pi, but exp(I*i) evaluated to argument slightly bigger than pi + return re(res) + return res + + def _eval_power(self, other): + return self.func(self.args[0]*other) + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + + def as_base_exp(self): + # XXX exp_polar(0) is special! + if self.args[0] == 0: + return self, S.One + return ExpBase.as_base_exp(self) + + +class ExpMeta(FunctionClass): + def __instancecheck__(cls, instance): + if exp in instance.__class__.__mro__: + return True + return isinstance(instance, Pow) and instance.base is S.Exp1 + + +class exp(ExpBase, metaclass=ExpMeta): + """ + The exponential function, :math:`e^x`. + + Examples + ======== + + >>> from sympy import exp, I, pi + >>> from sympy.abc import x + >>> exp(x) + exp(x) + >>> exp(x).diff(x) + exp(x) + >>> exp(I*pi) + -1 + + Parameters + ========== + + arg : Expr + + See Also + ======== + + log + """ + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return self + else: + raise ArgumentIndexError(self, argindex) + + def _eval_refine(self, assumptions): + from sympy.assumptions import ask, Q + arg = self.args[0] + if arg.is_Mul: + Ioo = I*S.Infinity + if arg in [Ioo, -Ioo]: + return S.NaN + + coeff = arg.as_coefficient(pi*I) + if coeff: + if ask(Q.integer(2*coeff)): + if ask(Q.even(coeff)): + return S.One + elif ask(Q.odd(coeff)): + return S.NegativeOne + elif ask(Q.even(coeff + S.Half)): + return -I + elif ask(Q.odd(coeff + S.Half)): + return I + + @classmethod + def eval(cls, arg): + from sympy.calculus import AccumBounds + from sympy.matrices.matrixbase import MatrixBase + from sympy.sets.setexpr import SetExpr + from sympy.simplify.simplify import logcombine + if isinstance(arg, MatrixBase): + return arg.exp() + elif global_parameters.exp_is_pow: + return Pow(S.Exp1, arg) + elif arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg.is_zero: + return S.One + elif arg is S.One: + return S.Exp1 + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Zero + elif arg is S.ComplexInfinity: + return S.NaN + elif isinstance(arg, log): + return arg.args[0] + elif isinstance(arg, AccumBounds): + return AccumBounds(exp(arg.min), exp(arg.max)) + elif isinstance(arg, SetExpr): + return arg._eval_func(cls) + elif arg.is_Mul: + coeff = arg.as_coefficient(pi*I) + if coeff: + if (2*coeff).is_integer: + if coeff.is_even: + return S.One + elif coeff.is_odd: + return S.NegativeOne + elif (coeff + S.Half).is_even: + return -I + elif (coeff + S.Half).is_odd: + return I + elif coeff.is_Rational: + ncoeff = coeff % 2 # restrict to [0, 2pi) + if ncoeff > 1: # restrict to (-pi, pi] + ncoeff -= 2 + if ncoeff != coeff: + return cls(ncoeff*pi*I) + + # Warning: code in risch.py will be very sensitive to changes + # in this (see DifferentialExtension). + + # look for a single log factor + + coeff, terms = arg.as_coeff_Mul() + + # but it can't be multiplied by oo + if coeff in [S.NegativeInfinity, S.Infinity]: + if terms.is_number: + if coeff is S.NegativeInfinity: + terms = -terms + if re(terms).is_zero and terms is not S.Zero: + return S.NaN + if re(terms).is_positive and im(terms) is not S.Zero: + return S.ComplexInfinity + if re(terms).is_negative: + return S.Zero + return None + + coeffs, log_term = [coeff], None + for term in Mul.make_args(terms): + term_ = logcombine(term) + if isinstance(term_, log): + if log_term is None: + log_term = term_.args[0] + else: + return None + elif term.is_comparable: + coeffs.append(term) + else: + return None + + return log_term**Mul(*coeffs) if log_term else None + + elif arg.is_Add: + out = [] + add = [] + argchanged = False + for a in arg.args: + if a is S.One: + add.append(a) + continue + newa = cls(a) + if isinstance(newa, cls): + if newa.args[0] != a: + add.append(newa.args[0]) + argchanged = True + else: + add.append(a) + else: + out.append(newa) + if out or argchanged: + return Mul(*out)*cls(Add(*add), evaluate=False) + + if arg.is_zero: + return S.One + + @property + def base(self): + """ + Returns the base of the exponential function. + """ + return S.Exp1 + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + """ + Calculates the next term in the Taylor series expansion. + """ + if n < 0: + return S.Zero + if n == 0: + return S.One + x = sympify(x) + if previous_terms: + p = previous_terms[-1] + if p is not None: + return p * x / n + return x**n/factorial(n) + + def as_real_imag(self, deep=True, **hints): + """ + Returns this function as a 2-tuple representing a complex number. + + Examples + ======== + + >>> from sympy import exp, I + >>> from sympy.abc import x + >>> exp(x).as_real_imag() + (exp(re(x))*cos(im(x)), exp(re(x))*sin(im(x))) + >>> exp(1).as_real_imag() + (E, 0) + >>> exp(I).as_real_imag() + (cos(1), sin(1)) + >>> exp(1+I).as_real_imag() + (E*cos(1), E*sin(1)) + + See Also + ======== + + sympy.functions.elementary.complexes.re + sympy.functions.elementary.complexes.im + """ + from sympy.functions.elementary.trigonometric import cos, sin + re, im = self.args[0].as_real_imag() + if deep: + re = re.expand(deep, **hints) + im = im.expand(deep, **hints) + cos, sin = cos(im), sin(im) + return (exp(re)*cos, exp(re)*sin) + + def _eval_subs(self, old, new): + # keep processing of power-like args centralized in Pow + if old.is_Pow: # handle (exp(3*log(x))).subs(x**2, z) -> z**(3/2) + old = exp(old.exp*log(old.base)) + elif old is S.Exp1 and new.is_Function: + old = exp + if isinstance(old, exp) or old is S.Exp1: + f = lambda a: Pow(*a.as_base_exp(), evaluate=False) if ( + a.is_Pow or isinstance(a, exp)) else a + return Pow._eval_subs(f(self), f(old), new) + + if old is exp and not new.is_Function: + return new**self.exp._subs(old, new) + return super()._eval_subs(old, new) + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + elif self.args[0].is_imaginary: + arg2 = -S(2) * I * self.args[0] / pi + return arg2.is_even + + def _eval_is_complex(self): + def complex_extended_negative(arg): + yield arg.is_complex + yield arg.is_extended_negative + return fuzzy_or(complex_extended_negative(self.args[0])) + + def _eval_is_algebraic(self): + if (self.exp / pi / I).is_rational: + return True + if fuzzy_not(self.exp.is_zero): + if self.exp.is_algebraic: + return False + elif (self.exp / pi).is_rational: + return False + + def _eval_is_extended_positive(self): + if self.exp.is_extended_real: + return self.args[0] is not S.NegativeInfinity + elif self.exp.is_imaginary: + arg2 = -I * self.args[0] / pi + return arg2.is_even + + def _eval_nseries(self, x, n, logx, cdir=0): + # NOTE Please see the comment at the beginning of this file, labelled + # IMPORTANT. + from sympy.functions.elementary.complexes import sign + from sympy.functions.elementary.integers import ceiling + from sympy.series.limits import limit + from sympy.series.order import Order + from sympy.simplify.powsimp import powsimp + arg = self.exp + arg_series = arg._eval_nseries(x, n=n, logx=logx) + if arg_series.is_Order: + return 1 + arg_series + arg0 = limit(arg_series.removeO(), x, 0) + if arg0 is S.NegativeInfinity: + return Order(x**n, x) + if arg0 is S.Infinity: + return self + if arg0.is_infinite: + raise PoleError("Cannot expand %s around 0" % (self)) + # checking for indecisiveness/ sign terms in arg0 + if any(isinstance(arg, sign) for arg in arg0.args): + return self + t = Dummy("t") + nterms = n + try: + cf = Order(arg.as_leading_term(x, logx=logx), x).getn() + except (NotImplementedError, PoleError): + cf = 0 + if cf and cf > 0: + nterms = ceiling(n/cf) + exp_series = exp(t)._taylor(t, nterms) + r = exp(arg0)*exp_series.subs(t, arg_series - arg0) + rep = {logx: log(x)} if logx is not None else {} + if r.subs(rep) == self: + return r + if cf and cf > 1: + r += Order((arg_series - arg0)**n, x)/x**((cf-1)*n) + else: + r += Order((arg_series - arg0)**n, x) + r = r.expand() + r = powsimp(r, deep=True, combine='exp') + # powsimp may introduce unexpanded (-1)**Rational; see PR #17201 + simplerat = lambda x: x.is_Rational and x.q in [3, 4, 6] + w = Wild('w', properties=[simplerat]) + r = r.replace(S.NegativeOne**w, expand_complex(S.NegativeOne**w)) + return r + + def _taylor(self, x, n): + l = [] + g = None + for i in range(n): + g = self.taylor_term(i, self.args[0], g) + g = g.nseries(x, n=n) + l.append(g.removeO()) + return Add(*l) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.util import AccumBounds + arg = self.args[0].cancel().as_leading_term(x, logx=logx) + arg0 = arg.subs(x, 0) + if arg is S.NaN: + return S.NaN + if isinstance(arg0, AccumBounds): + # This check addresses a corner case involving AccumBounds. + # if isinstance(arg, AccumBounds) is True, then arg0 can either be 0, + # AccumBounds(-oo, 0) or AccumBounds(-oo, oo). + # Check out function: test_issue_18473() in test_exponential.py and + # test_limits.py for more information. + if re(cdir) < S.Zero: + return exp(-arg0) + return exp(arg0) + if arg0 is S.NaN: + arg0 = arg.limit(x, 0) + if arg0.is_infinite is False: + return exp(arg0) + raise PoleError("Cannot expand %s around 0" % (self)) + + def _eval_rewrite_as_sin(self, arg, **kwargs): + from sympy.functions.elementary.trigonometric import sin + return sin(I*arg + pi/2) - I*sin(I*arg) + + def _eval_rewrite_as_cos(self, arg, **kwargs): + from sympy.functions.elementary.trigonometric import cos + return cos(I*arg) + I*cos(I*arg + pi/2) + + def _eval_rewrite_as_tanh(self, arg, **kwargs): + from sympy.functions.elementary.hyperbolic import tanh + return (1 + tanh(arg/2))/(1 - tanh(arg/2)) + + def _eval_rewrite_as_sqrt(self, arg, **kwargs): + from sympy.functions.elementary.trigonometric import sin, cos + if arg.is_Mul: + coeff = arg.coeff(pi*I) + if coeff and coeff.is_number: + cosine, sine = cos(pi*coeff), sin(pi*coeff) + if not isinstance(cosine, cos) and not isinstance (sine, sin): + return cosine + I*sine + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + if arg.is_Mul: + logs = [a for a in arg.args if isinstance(a, log) and len(a.args) == 1] + if logs: + return Pow(logs[0].args[0], arg.coeff(logs[0])) + + +def match_real_imag(expr): + r""" + Try to match expr with $a + Ib$ for real $a$ and $b$. + + ``match_real_imag`` returns a tuple containing the real and imaginary + parts of expr or ``(None, None)`` if direct matching is not possible. Contrary + to :func:`~.re`, :func:`~.im``, and ``as_real_imag()``, this helper will not force things + by returning expressions themselves containing ``re()`` or ``im()`` and it + does not expand its argument either. + + """ + r_, i_ = expr.as_independent(I, as_Add=True) + if i_ == 0 and r_.is_real: + return (r_, i_) + i_ = i_.as_coefficient(I) + if i_ and i_.is_real and r_.is_real: + return (r_, i_) + else: + return (None, None) # simpler to check for than None + + +class log(DefinedFunction): + r""" + The natural logarithm function `\ln(x)` or `\log(x)`. + + Explanation + =========== + + Logarithms are taken with the natural base, `e`. To get + a logarithm of a different base ``b``, use ``log(x, b)``, + which is essentially short-hand for ``log(x)/log(b)``. + + ``log`` represents the principal branch of the natural + logarithm. As such it has a branch cut along the negative + real axis and returns values having a complex argument in + `(-\pi, \pi]`. + + Examples + ======== + + >>> from sympy import log, sqrt, S, I + >>> log(8, 2) + 3 + >>> log(S(8)/3, 2) + -log(3)/log(2) + 3 + >>> log(-1 + I*sqrt(3)) + log(2) + 2*I*pi/3 + + See Also + ======== + + exp + + """ + + args: tuple[Expr] + + _singularities = (S.Zero, S.ComplexInfinity) + + def fdiff(self, argindex=1): + """ + Returns the first derivative of the function. + """ + if argindex == 1: + return 1/self.args[0] + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + r""" + Returns `e^x`, the inverse function of `\log(x)`. + """ + return exp + + @classmethod + def eval(cls, arg, base=None): + from sympy.calculus import AccumBounds + from sympy.sets.setexpr import SetExpr + + arg = sympify(arg) + + if base is not None: + base = sympify(base) + if base == 1: + if arg == 1: + return S.NaN + else: + return S.ComplexInfinity + try: + # handle extraction of powers of the base now + # or else expand_log in Mul would have to handle this + n = multiplicity(base, arg) + if n: + return n + log(arg / base**n) / log(base) + else: + return log(arg)/log(base) + except ValueError: + pass + if base is not S.Exp1: + return cls(arg)/cls(base) + else: + return cls(arg) + + if arg.is_Number: + if arg.is_zero: + return S.ComplexInfinity + elif arg is S.One: + return S.Zero + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Infinity + elif arg is S.NaN: + return S.NaN + elif arg.is_Rational and arg.p == 1: + return -cls(arg.q) + + if arg.is_Pow and arg.base is S.Exp1 and arg.exp.is_extended_real: + return arg.exp + if isinstance(arg, exp) and arg.exp.is_extended_real: + return arg.exp + elif isinstance(arg, exp) and arg.exp.is_number: + r_, i_ = match_real_imag(arg.exp) + if i_ and i_.is_comparable: + i_ %= 2*pi + if i_ > pi: + i_ -= 2*pi + return r_ + expand_mul(i_ * I, deep=False) + elif isinstance(arg, exp_polar): + return unpolarify(arg.exp) + elif isinstance(arg, AccumBounds): + if arg.min.is_positive: + return AccumBounds(log(arg.min), log(arg.max)) + elif arg.min.is_zero: + return AccumBounds(S.NegativeInfinity, log(arg.max)) + else: + return S.NaN + elif isinstance(arg, SetExpr): + return arg._eval_func(cls) + + if arg.is_number: + if arg.is_negative: + return pi * I + cls(-arg) + elif arg is S.ComplexInfinity: + return S.ComplexInfinity + elif arg is S.Exp1: + return S.One + + if arg.is_zero: + return S.ComplexInfinity + + # don't autoexpand Pow or Mul (see the issue 3351): + if not arg.is_Add: + coeff = arg.as_coefficient(I) + + if coeff is not None: + if coeff is S.Infinity: + return S.Infinity + elif coeff is S.NegativeInfinity: + return S.Infinity + elif coeff.is_Rational: + if coeff.is_nonnegative: + return pi * I * S.Half + cls(coeff) + else: + return -pi * I * S.Half + cls(-coeff) + + if arg.is_number and arg.is_algebraic: + # Match arg = coeff*(r_ + i_*I) with coeff>0, r_ and i_ real. + coeff, arg_ = arg.as_independent(I, as_Add=False) + if coeff.is_negative: + coeff *= -1 + arg_ *= -1 + arg_ = expand_mul(arg_, deep=False) + r_, i_ = arg_.as_independent(I, as_Add=True) + i_ = i_.as_coefficient(I) + if coeff.is_real and i_ and i_.is_real and r_.is_real: + if r_.is_zero: + if i_.is_positive: + return pi * I * S.Half + cls(coeff * i_) + elif i_.is_negative: + return -pi * I * S.Half + cls(coeff * -i_) + else: + from sympy.simplify import ratsimp + # Check for arguments involving rational multiples of pi + t = (i_/r_).cancel() + t1 = (-t).cancel() + atan_table = _log_atan_table() + if t in atan_table: + modulus = ratsimp(coeff * Abs(arg_)) + if r_.is_positive: + return cls(modulus) + I * atan_table[t] + else: + return cls(modulus) + I * (atan_table[t] - pi) + elif t1 in atan_table: + modulus = ratsimp(coeff * Abs(arg_)) + if r_.is_positive: + return cls(modulus) + I * (-atan_table[t1]) + else: + return cls(modulus) + I * (pi - atan_table[t1]) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): # of log(1+x) + r""" + Returns the next term in the Taylor series expansion of `\log(1+x)`. + """ + from sympy.simplify.powsimp import powsimp + if n < 0: + return S.Zero + x = sympify(x) + if n == 0: + return x + if previous_terms: + p = previous_terms[-1] + if p is not None: + return powsimp((-n) * p * x / (n + 1), deep=True, combine='exp') + return (1 - 2*(n % 2)) * x**(n + 1)/(n + 1) + + def _eval_expand_log(self, deep=True, **hints): + from sympy.concrete import Sum, Product + force = hints.get('force', False) + factor = hints.get('factor', False) + if (len(self.args) == 2): + return expand_log(self.func(*self.args), deep=deep, force=force) + arg = self.args[0] + if arg.is_Integer: + # remove perfect powers + p = perfect_power(arg) + logarg = None + coeff = 1 + if p is not False: + arg, coeff = p + logarg = self.func(arg) + # expand as product of its prime factors if factor=True + if factor: + p = factorint(arg) + if arg not in p.keys(): + logarg = sum(n*log(val) for val, n in p.items()) + if logarg is not None: + return coeff*logarg + elif arg.is_Rational: + return log(arg.p) - log(arg.q) + elif arg.is_Mul: + expr = [] + nonpos = [] + for x in arg.args: + if force or x.is_positive or x.is_polar: + a = self.func(x) + if isinstance(a, log): + expr.append(self.func(x)._eval_expand_log(**hints)) + else: + expr.append(a) + elif x.is_negative: + a = self.func(-x) + expr.append(a) + nonpos.append(S.NegativeOne) + else: + nonpos.append(x) + return Add(*expr) + log(Mul(*nonpos)) + elif arg.is_Pow or isinstance(arg, exp): + if force or (arg.exp.is_extended_real and (arg.base.is_positive or ((arg.exp+1) + .is_positive and (arg.exp-1).is_nonpositive))) or arg.base.is_polar: + b = arg.base + e = arg.exp + a = self.func(b) + if isinstance(a, log): + return unpolarify(e) * a._eval_expand_log(**hints) + else: + return unpolarify(e) * a + elif isinstance(arg, Product): + if force or arg.function.is_positive: + return Sum(log(arg.function), *arg.limits) + + return self.func(arg) + + def _eval_simplify(self, **kwargs): + from sympy.simplify.simplify import expand_log, simplify, inversecombine + if len(self.args) == 2: # it's unevaluated + return simplify(self.func(*self.args), **kwargs) + + expr = self.func(simplify(self.args[0], **kwargs)) + if kwargs['inverse']: + expr = inversecombine(expr) + expr = expand_log(expr, deep=True) + return min([expr, self], key=kwargs['measure']) + + def as_real_imag(self, deep=True, **hints): + """ + Returns this function as a complex coordinate. + + Examples + ======== + + >>> from sympy import I, log + >>> from sympy.abc import x + >>> log(x).as_real_imag() + (log(Abs(x)), arg(x)) + >>> log(I).as_real_imag() + (0, pi/2) + >>> log(1 + I).as_real_imag() + (log(sqrt(2)), pi/4) + >>> log(I*x).as_real_imag() + (log(Abs(x)), arg(I*x)) + + """ + sarg = self.args[0] + if deep: + sarg = self.args[0].expand(deep, **hints) + sarg_abs = Abs(sarg) + if sarg_abs == sarg: + return self, S.Zero + sarg_arg = arg(sarg) + if hints.get('log', False): # Expand the log + hints['complex'] = False + return (log(sarg_abs).expand(deep, **hints), sarg_arg) + else: + return log(sarg_abs), sarg_arg + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if (self.args[0] - 1).is_zero: + return True + if s.args[0].is_rational and fuzzy_not((self.args[0] - 1).is_zero): + return False + else: + return s.is_rational + + def _eval_is_algebraic(self): + s = self.func(*self.args) + if s.func == self.func: + if (self.args[0] - 1).is_zero: + return True + elif fuzzy_not((self.args[0] - 1).is_zero): + if self.args[0].is_algebraic: + return False + else: + return s.is_algebraic + + def _eval_is_extended_real(self): + return self.args[0].is_extended_positive + + def _eval_is_complex(self): + z = self.args[0] + return fuzzy_and([z.is_complex, fuzzy_not(z.is_zero)]) + + def _eval_is_finite(self): + arg = self.args[0] + if arg.is_zero: + return False + return arg.is_finite + + def _eval_is_extended_positive(self): + return (self.args[0] - 1).is_extended_positive + + def _eval_is_zero(self): + return (self.args[0] - 1).is_zero + + def _eval_is_extended_nonnegative(self): + return (self.args[0] - 1).is_extended_nonnegative + + def _eval_nseries(self, x, n, logx, cdir=0): + # NOTE Please see the comment at the beginning of this file, labelled + # IMPORTANT. + from sympy.series.order import Order + from sympy.simplify.simplify import logcombine + from sympy.core.symbol import Dummy + + if self.args[0] == x: + return log(x) if logx is None else logx + arg = self.args[0] + t = Dummy('t', positive=True) + if cdir == 0: + cdir = 1 + z = arg.subs(x, cdir*t) + + k, l = Wild("k"), Wild("l") + r = z.match(k*t**l) + if r is not None: + k, l = r[k], r[l] + if l != 0 and not l.has(t) and not k.has(t): + r = l*log(x) if logx is None else l*logx + r += log(k) - l*log(cdir) # XXX true regardless of assumptions? + return r + + def coeff_exp(term, x): + coeff, exp = S.One, S.Zero + for factor in Mul.make_args(term): + if factor.has(x): + base, exp = factor.as_base_exp() + if base != x: + try: + return term.leadterm(x) + except ValueError: + return term, S.Zero + else: + coeff *= factor + return coeff, exp + + # TODO new and probably slow + try: + a, b = z.leadterm(t, logx=logx, cdir=1) + except (ValueError, NotImplementedError, PoleError): + s = z._eval_nseries(t, n=n, logx=logx, cdir=1) + while s.is_Order: + n += 1 + s = z._eval_nseries(t, n=n, logx=logx, cdir=1) + try: + a, b = s.removeO().leadterm(t, cdir=1) + except ValueError: + a, b = s.removeO().as_leading_term(t, cdir=1), S.Zero + + p = (z/(a*t**b) - 1).cancel()._eval_nseries(t, n=n, logx=logx, cdir=1) + if p.has(exp): + p = logcombine(p) + if isinstance(p, Order): + n = p.getn() + _, d = coeff_exp(p, t) + logx = log(x) if logx is None else logx + + if not d.is_positive: + res = log(a) - b*log(cdir) + b*logx + _res = res + logflags = {"deep": True, "log": True, "mul": False, "power_exp": False, + "power_base": False, "multinomial": False, "basic": False, "force": True, + "factor": False} + expr = self.expand(**logflags) + if (not a.could_extract_minus_sign() and + logx.could_extract_minus_sign()): + _res = _res.subs(-logx, -log(x)).expand(**logflags) + else: + _res = _res.subs(logx, log(x)).expand(**logflags) + if _res == expr: + return res + return res + Order(x**n, x) + + def mul(d1, d2): + res = {} + for e1, e2 in product(d1, d2): + ex = e1 + e2 + if ex < n: + res[ex] = res.get(ex, S.Zero) + d1[e1]*d2[e2] + return res + + pterms = {} + + for term in Add.make_args(p.removeO()): + co1, e1 = coeff_exp(term, t) + pterms[e1] = pterms.get(e1, S.Zero) + co1 + + k = S.One + terms = {} + pk = pterms + + while k*d < n: + coeff = -S.NegativeOne**k/k + for ex in pk: + terms[ex] = terms.get(ex, S.Zero) + coeff*pk[ex] + pk = mul(pk, pterms) + k += S.One + + res = log(a) - b*log(cdir) + b*logx + for ex in terms: + res += terms[ex].cancel()*t**(ex) + + if a.is_negative and im(z) != 0: + from sympy.functions.special.delta_functions import Heaviside + for i, term in enumerate(z.lseries(t)): + if not term.is_real or i == 5: + break + if i < 5: + coeff, _ = term.as_coeff_exponent(t) + res += -2*I*pi*Heaviside(-im(coeff), 0) + + res = res.subs(t, x/cdir) + return res + Order(x**n, x) + + def _eval_as_leading_term(self, x, logx, cdir): + # NOTE + # Refer https://github.com/sympy/sympy/pull/23592 for more information + # on each of the following steps involved in this method. + arg0 = self.args[0].together() + + # STEP 1 + t = Dummy('t', positive=True) + if cdir == 0: + cdir = 1 + z = arg0.subs(x, cdir*t) + + # STEP 2 + try: + c, e = z.leadterm(t, logx=logx, cdir=1) + except ValueError: + arg = arg0.as_leading_term(x, logx=logx, cdir=cdir) + return log(arg) + if c.has(t): + c = c.subs(t, x/cdir) + if e != 0: + raise PoleError("Cannot expand %s around 0" % (self)) + return log(c) + + # STEP 3 + if c == S.One and e == S.Zero: + return (arg0 - S.One).as_leading_term(x, logx=logx) + + # STEP 4 + res = log(c) - e*log(cdir) + logx = log(x) if logx is None else logx + res += e*logx + + # STEP 5 + if c.is_negative and im(z) != 0: + from sympy.functions.special.delta_functions import Heaviside + for i, term in enumerate(z.lseries(t)): + if not term.is_real or i == 5: + break + if i < 5: + coeff, _ = term.as_coeff_exponent(t) + res += -2*I*pi*Heaviside(-im(coeff), 0) + return res + + +class LambertW(DefinedFunction): + r""" + The Lambert W function $W(z)$ is defined as the inverse + function of $w \exp(w)$ [1]_. + + Explanation + =========== + + In other words, the value of $W(z)$ is such that $z = W(z) \exp(W(z))$ + for any complex number $z$. The Lambert W function is a multivalued + function with infinitely many branches $W_k(z)$, indexed by + $k \in \mathbb{Z}$. Each branch gives a different solution $w$ + of the equation $z = w \exp(w)$. + + The Lambert W function has two partially real branches: the + principal branch ($k = 0$) is real for real $z > -1/e$, and the + $k = -1$ branch is real for $-1/e < z < 0$. All branches except + $k = 0$ have a logarithmic singularity at $z = 0$. + + Examples + ======== + + >>> from sympy import LambertW + >>> LambertW(1.2) + 0.635564016364870 + >>> LambertW(1.2, -1).n() + -1.34747534407696 - 4.41624341514535*I + >>> LambertW(-1).is_real + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lambert_W_function + """ + _singularities = (-Pow(S.Exp1, -1, evaluate=False), S.ComplexInfinity) + + @classmethod + def eval(cls, x, k=None): + if k == S.Zero: + return cls(x) + elif k is None: + k = S.Zero + + if k.is_zero: + if x.is_zero: + return S.Zero + if x is S.Exp1: + return S.One + if x == -1/S.Exp1: + return S.NegativeOne + if x == -log(2)/2: + return -log(2) + if x == 2*log(2): + return log(2) + if x == -pi/2: + return I*pi/2 + if x == exp(1 + S.Exp1): + return S.Exp1 + if x is S.Infinity: + return S.Infinity + + if fuzzy_not(k.is_zero): + if x.is_zero: + return S.NegativeInfinity + if k is S.NegativeOne: + if x == -pi/2: + return -I*pi/2 + elif x == -1/S.Exp1: + return S.NegativeOne + elif x == -2*exp(-2): + return -Integer(2) + + def fdiff(self, argindex=1): + """ + Return the first derivative of this function. + """ + x = self.args[0] + + if len(self.args) == 1: + if argindex == 1: + return LambertW(x)/(x*(1 + LambertW(x))) + else: + k = self.args[1] + if argindex == 1: + return LambertW(x, k)/(x*(1 + LambertW(x, k))) + + raise ArgumentIndexError(self, argindex) + + def _eval_is_extended_real(self): + x = self.args[0] + if len(self.args) == 1: + k = S.Zero + else: + k = self.args[1] + if k.is_zero: + if (x + 1/S.Exp1).is_positive: + return True + elif (x + 1/S.Exp1).is_nonpositive: + return False + elif (k + 1).is_zero: + if x.is_negative and (x + 1/S.Exp1).is_positive: + return True + elif x.is_nonpositive or (x + 1/S.Exp1).is_nonnegative: + return False + elif fuzzy_not(k.is_zero) and fuzzy_not((k + 1).is_zero): + if x.is_extended_real: + return False + + def _eval_is_finite(self): + return self.args[0].is_finite + + def _eval_is_algebraic(self): + s = self.func(*self.args) + if s.func == self.func: + if fuzzy_not(self.args[0].is_zero) and self.args[0].is_algebraic: + return False + else: + return s.is_algebraic + + def _eval_as_leading_term(self, x, logx, cdir): + if len(self.args) == 1: + arg = self.args[0] + arg0 = arg.subs(x, 0).cancel() + if not arg0.is_zero: + return self.func(arg0) + return arg.as_leading_term(x) + + def _eval_nseries(self, x, n, logx, cdir=0): + if len(self.args) == 1: + from sympy.functions.elementary.integers import ceiling + from sympy.series.order import Order + arg = self.args[0].nseries(x, n=n, logx=logx) + lt = arg.as_leading_term(x, logx=logx) + lte = 1 + if lt.is_Pow: + lte = lt.exp + if ceiling(n/lte) >= 1: + s = Add(*[(-S.One)**(k - 1)*Integer(k)**(k - 2)/ + factorial(k - 1)*arg**k for k in range(1, ceiling(n/lte))]) + s = expand_multinomial(s) + else: + s = S.Zero + + return s + Order(x**n, x) + return super()._eval_nseries(x, n, logx) + + def _eval_is_zero(self): + x = self.args[0] + if len(self.args) == 1: + return x.is_zero + else: + return fuzzy_and([x.is_zero, self.args[1].is_zero]) + + +@cacheit +def _log_atan_table(): + return { + # first quadrant only + sqrt(3): pi / 3, + 1: pi / 4, + sqrt(5 - 2 * sqrt(5)): pi / 5, + sqrt(2) * sqrt(5 - sqrt(5)) / (1 + sqrt(5)): pi / 5, + sqrt(5 + 2 * sqrt(5)): pi * Rational(2, 5), + sqrt(2) * sqrt(sqrt(5) + 5) / (-1 + sqrt(5)): pi * Rational(2, 5), + sqrt(3) / 3: pi / 6, + sqrt(2) - 1: pi / 8, + sqrt(2 - sqrt(2)) / sqrt(sqrt(2) + 2): pi / 8, + sqrt(2) + 1: pi * Rational(3, 8), + sqrt(sqrt(2) + 2) / sqrt(2 - sqrt(2)): pi * Rational(3, 8), + sqrt(1 - 2 * sqrt(5) / 5): pi / 10, + (-sqrt(2) + sqrt(10)) / (2 * sqrt(sqrt(5) + 5)): pi / 10, + sqrt(1 + 2 * sqrt(5) / 5): pi * Rational(3, 10), + (sqrt(2) + sqrt(10)) / (2 * sqrt(5 - sqrt(5))): pi * Rational(3, 10), + 2 - sqrt(3): pi / 12, + (-1 + sqrt(3)) / (1 + sqrt(3)): pi / 12, + 2 + sqrt(3): pi * Rational(5, 12), + (1 + sqrt(3)) / (-1 + sqrt(3)): pi * Rational(5, 12) + } diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/hyperbolic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/hyperbolic.py new file mode 100644 index 0000000000000000000000000000000000000000..1031d035373bb641d26e61a395e6048906285bfe --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/hyperbolic.py @@ -0,0 +1,2285 @@ +from sympy.core import S, sympify, cacheit +from sympy.core.add import Add +from sympy.core.function import DefinedFunction, ArgumentIndexError +from sympy.core.logic import fuzzy_or, fuzzy_and, fuzzy_not, FuzzyBool +from sympy.core.numbers import I, pi, Rational +from sympy.core.symbol import Dummy +from sympy.functions.combinatorial.factorials import (binomial, factorial, + RisingFactorial) +from sympy.functions.combinatorial.numbers import bernoulli, euler, nC +from sympy.functions.elementary.complexes import Abs, im, re +from sympy.functions.elementary.exponential import exp, log, match_real_imag +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import ( + acos, acot, asin, atan, cos, cot, csc, sec, sin, tan, + _imaginary_unit_as_coefficient) +from sympy.polys.specialpolys import symmetric_poly + + +def _rewrite_hyperbolics_as_exp(expr): + return expr.xreplace({h: h.rewrite(exp) + for h in expr.atoms(HyperbolicFunction)}) + + +@cacheit +def _acosh_table(): + return { + I: log(I*(1 + sqrt(2))), + -I: log(-I*(1 + sqrt(2))), + S.Half: pi/3, + Rational(-1, 2): pi*Rational(2, 3), + sqrt(2)/2: pi/4, + -sqrt(2)/2: pi*Rational(3, 4), + 1/sqrt(2): pi/4, + -1/sqrt(2): pi*Rational(3, 4), + sqrt(3)/2: pi/6, + -sqrt(3)/2: pi*Rational(5, 6), + (sqrt(3) - 1)/sqrt(2**3): pi*Rational(5, 12), + -(sqrt(3) - 1)/sqrt(2**3): pi*Rational(7, 12), + sqrt(2 + sqrt(2))/2: pi/8, + -sqrt(2 + sqrt(2))/2: pi*Rational(7, 8), + sqrt(2 - sqrt(2))/2: pi*Rational(3, 8), + -sqrt(2 - sqrt(2))/2: pi*Rational(5, 8), + (1 + sqrt(3))/(2*sqrt(2)): pi/12, + -(1 + sqrt(3))/(2*sqrt(2)): pi*Rational(11, 12), + (sqrt(5) + 1)/4: pi/5, + -(sqrt(5) + 1)/4: pi*Rational(4, 5) + } + + +@cacheit +def _acsch_table(): + return { + I: -pi / 2, + I*(sqrt(2) + sqrt(6)): -pi / 12, + I*(1 + sqrt(5)): -pi / 10, + I*2 / sqrt(2 - sqrt(2)): -pi / 8, + I*2: -pi / 6, + I*sqrt(2 + 2/sqrt(5)): -pi / 5, + I*sqrt(2): -pi / 4, + I*(sqrt(5)-1): -3*pi / 10, + I*2 / sqrt(3): -pi / 3, + I*2 / sqrt(2 + sqrt(2)): -3*pi / 8, + I*sqrt(2 - 2/sqrt(5)): -2*pi / 5, + I*(sqrt(6) - sqrt(2)): -5*pi / 12, + S(2): -I*log((1+sqrt(5))/2), + } + + +@cacheit +def _asech_table(): + return { + I: - (pi*I / 2) + log(1 + sqrt(2)), + -I: (pi*I / 2) + log(1 + sqrt(2)), + (sqrt(6) - sqrt(2)): pi / 12, + (sqrt(2) - sqrt(6)): 11*pi / 12, + sqrt(2 - 2/sqrt(5)): pi / 10, + -sqrt(2 - 2/sqrt(5)): 9*pi / 10, + 2 / sqrt(2 + sqrt(2)): pi / 8, + -2 / sqrt(2 + sqrt(2)): 7*pi / 8, + 2 / sqrt(3): pi / 6, + -2 / sqrt(3): 5*pi / 6, + (sqrt(5) - 1): pi / 5, + (1 - sqrt(5)): 4*pi / 5, + sqrt(2): pi / 4, + -sqrt(2): 3*pi / 4, + sqrt(2 + 2/sqrt(5)): 3*pi / 10, + -sqrt(2 + 2/sqrt(5)): 7*pi / 10, + S(2): pi / 3, + -S(2): 2*pi / 3, + sqrt(2*(2 + sqrt(2))): 3*pi / 8, + -sqrt(2*(2 + sqrt(2))): 5*pi / 8, + (1 + sqrt(5)): 2*pi / 5, + (-1 - sqrt(5)): 3*pi / 5, + (sqrt(6) + sqrt(2)): 5*pi / 12, + (-sqrt(6) - sqrt(2)): 7*pi / 12, + I*S.Infinity: -pi*I / 2, + I*S.NegativeInfinity: pi*I / 2, + } + +############################################################################### +########################### HYPERBOLIC FUNCTIONS ############################## +############################################################################### + + +class HyperbolicFunction(DefinedFunction): + """ + Base class for hyperbolic functions. + + See Also + ======== + + sinh, cosh, tanh, coth + """ + + unbranched = True + + +def _peeloff_ipi(arg): + r""" + Split ARG into two parts, a "rest" and a multiple of $I\pi$. + This assumes ARG to be an ``Add``. + The multiple of $I\pi$ returned in the second position is always a ``Rational``. + + Examples + ======== + + >>> from sympy.functions.elementary.hyperbolic import _peeloff_ipi as peel + >>> from sympy import pi, I + >>> from sympy.abc import x, y + >>> peel(x + I*pi/2) + (x, 1/2) + >>> peel(x + I*2*pi/3 + I*pi*y) + (x + I*pi*y + I*pi/6, 1/2) + """ + ipi = pi*I + for a in Add.make_args(arg): + if a == ipi: + K = S.One + break + elif a.is_Mul: + K, p = a.as_two_terms() + if p == ipi and K.is_Rational: + break + else: + return arg, S.Zero + + m1 = (K % S.Half) + m2 = K - m1 + return arg - m2*ipi, m2 + + +class sinh(HyperbolicFunction): + r""" + ``sinh(x)`` is the hyperbolic sine of ``x``. + + The hyperbolic sine function is $\frac{e^x - e^{-x}}{2}$. + + Examples + ======== + + >>> from sympy import sinh + >>> from sympy.abc import x + >>> sinh(x) + sinh(x) + + See Also + ======== + + cosh, tanh, asinh + """ + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return cosh(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return asinh + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.NegativeInfinity + elif arg.is_zero: + return S.Zero + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.NaN + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + return I * sin(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_Add: + x, m = _peeloff_ipi(arg) + if m: + m = m*pi*I + return sinh(m)*cosh(x) + cosh(m)*sinh(x) + + if arg.is_zero: + return S.Zero + + if arg.func == asinh: + return arg.args[0] + + if arg.func == acosh: + x = arg.args[0] + return sqrt(x - 1) * sqrt(x + 1) + + if arg.func == atanh: + x = arg.args[0] + return x/sqrt(1 - x**2) + + if arg.func == acoth: + x = arg.args[0] + return 1/(sqrt(x - 1) * sqrt(x + 1)) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + """ + Returns the next term in the Taylor series expansion. + """ + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + if len(previous_terms) > 2: + p = previous_terms[-2] + return p * x**2 / (n*(n - 1)) + else: + return x**(n) / factorial(n) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + """ + Returns this function as a complex coordinate. + """ + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.expand(deep, **hints), S.Zero) + else: + return (self, S.Zero) + if deep: + re, im = self.args[0].expand(deep, **hints).as_real_imag() + else: + re, im = self.args[0].as_real_imag() + return (sinh(re)*cos(im), cosh(re)*sin(im)) + + def _eval_expand_complex(self, deep=True, **hints): + re_part, im_part = self.as_real_imag(deep=deep, **hints) + return re_part + im_part*I + + def _eval_expand_trig(self, deep=True, **hints): + if deep: + arg = self.args[0].expand(deep, **hints) + else: + arg = self.args[0] + x = None + if arg.is_Add: # TODO, implement more if deep stuff here + x, y = arg.as_two_terms() + else: + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff is not S.One and coeff.is_Integer and terms is not S.One: + x = terms + y = (coeff - 1)*x + if x is not None: + return (sinh(x)*cosh(y) + sinh(y)*cosh(x)).expand(trig=True) + return sinh(arg) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + return (exp(arg) - exp(-arg)) / 2 + + def _eval_rewrite_as_exp(self, arg, **kwargs): + return (exp(arg) - exp(-arg)) / 2 + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return -I * sin(I * arg) + + def _eval_rewrite_as_csc(self, arg, **kwargs): + return -I / csc(I * arg) + + def _eval_rewrite_as_cosh(self, arg, **kwargs): + return -I*cosh(arg + pi*I/2) + + def _eval_rewrite_as_tanh(self, arg, **kwargs): + tanh_half = tanh(S.Half*arg) + return 2*tanh_half/(1 - tanh_half**2) + + def _eval_rewrite_as_coth(self, arg, **kwargs): + coth_half = coth(S.Half*arg) + return 2*coth_half/(coth_half**2 - 1) + + def _eval_rewrite_as_csch(self, arg, **kwargs): + return 1 / csch(arg) + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if cdir.is_negative else '+') + if arg0.is_zero: + return arg + elif arg0.is_finite: + return self.func(arg0) + else: + return self + + def _eval_is_real(self): + arg = self.args[0] + if arg.is_real: + return True + + # if `im` is of the form n*pi + # else, check if it is a number + re, im = arg.as_real_imag() + return (im%pi).is_zero + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + + def _eval_is_positive(self): + if self.args[0].is_extended_real: + return self.args[0].is_positive + + def _eval_is_negative(self): + if self.args[0].is_extended_real: + return self.args[0].is_negative + + def _eval_is_finite(self): + arg = self.args[0] + return arg.is_finite + + def _eval_is_zero(self): + rest, ipi_mult = _peeloff_ipi(self.args[0]) + if rest.is_zero: + return ipi_mult.is_integer + + +class cosh(HyperbolicFunction): + r""" + ``cosh(x)`` is the hyperbolic cosine of ``x``. + + The hyperbolic cosine function is $\frac{e^x + e^{-x}}{2}$. + + Examples + ======== + + >>> from sympy import cosh + >>> from sympy.abc import x + >>> cosh(x) + cosh(x) + + See Also + ======== + + sinh, tanh, acosh + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return sinh(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + from sympy.functions.elementary.trigonometric import cos + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Infinity + elif arg.is_zero: + return S.One + elif arg.is_negative: + return cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.NaN + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + return cos(i_coeff) + else: + if arg.could_extract_minus_sign(): + return cls(-arg) + + if arg.is_Add: + x, m = _peeloff_ipi(arg) + if m: + m = m*pi*I + return cosh(m)*cosh(x) + sinh(m)*sinh(x) + + if arg.is_zero: + return S.One + + if arg.func == asinh: + return sqrt(1 + arg.args[0]**2) + + if arg.func == acosh: + return arg.args[0] + + if arg.func == atanh: + return 1/sqrt(1 - arg.args[0]**2) + + if arg.func == acoth: + x = arg.args[0] + return x/(sqrt(x - 1) * sqrt(x + 1)) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + + if len(previous_terms) > 2: + p = previous_terms[-2] + return p * x**2 / (n*(n - 1)) + else: + return x**(n)/factorial(n) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.expand(deep, **hints), S.Zero) + else: + return (self, S.Zero) + if deep: + re, im = self.args[0].expand(deep, **hints).as_real_imag() + else: + re, im = self.args[0].as_real_imag() + + return (cosh(re)*cos(im), sinh(re)*sin(im)) + + def _eval_expand_complex(self, deep=True, **hints): + re_part, im_part = self.as_real_imag(deep=deep, **hints) + return re_part + im_part*I + + def _eval_expand_trig(self, deep=True, **hints): + if deep: + arg = self.args[0].expand(deep, **hints) + else: + arg = self.args[0] + x = None + if arg.is_Add: # TODO, implement more if deep stuff here + x, y = arg.as_two_terms() + else: + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff is not S.One and coeff.is_Integer and terms is not S.One: + x = terms + y = (coeff - 1)*x + if x is not None: + return (cosh(x)*cosh(y) + sinh(x)*sinh(y)).expand(trig=True) + return cosh(arg) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + return (exp(arg) + exp(-arg)) / 2 + + def _eval_rewrite_as_exp(self, arg, **kwargs): + return (exp(arg) + exp(-arg)) / 2 + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return cos(I * arg, evaluate=False) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + return 1 / sec(I * arg, evaluate=False) + + def _eval_rewrite_as_sinh(self, arg, **kwargs): + return -I*sinh(arg + pi*I/2, evaluate=False) + + def _eval_rewrite_as_tanh(self, arg, **kwargs): + tanh_half = tanh(S.Half*arg)**2 + return (1 + tanh_half)/(1 - tanh_half) + + def _eval_rewrite_as_coth(self, arg, **kwargs): + coth_half = coth(S.Half*arg)**2 + return (coth_half + 1)/(coth_half - 1) + + def _eval_rewrite_as_sech(self, arg, **kwargs): + return 1 / sech(arg) + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if cdir.is_negative else '+') + if arg0.is_zero: + return S.One + elif arg0.is_finite: + return self.func(arg0) + else: + return self + + def _eval_is_real(self): + arg = self.args[0] + + # `cosh(x)` is real for real OR purely imaginary `x` + if arg.is_real or arg.is_imaginary: + return True + + # cosh(a+ib) = cos(b)*cosh(a) + i*sin(b)*sinh(a) + # the imaginary part can be an expression like n*pi + # if not, check if the imaginary part is a number + re, im = arg.as_real_imag() + return (im%pi).is_zero + + def _eval_is_positive(self): + # cosh(x+I*y) = cos(y)*cosh(x) + I*sin(y)*sinh(x) + # cosh(z) is positive iff it is real and the real part is positive. + # So we need sin(y)*sinh(x) = 0 which gives x=0 or y=n*pi + # Case 1 (y=n*pi): cosh(z) = (-1)**n * cosh(x) -> positive for n even + # Case 2 (x=0): cosh(z) = cos(y) -> positive when cos(y) is positive + z = self.args[0] + + x, y = z.as_real_imag() + ymod = y % (2*pi) + + yzero = ymod.is_zero + # shortcut if ymod is zero + if yzero: + return True + + xzero = x.is_zero + # shortcut x is not zero + if xzero is False: + return yzero + + return fuzzy_or([ + # Case 1: + yzero, + # Case 2: + fuzzy_and([ + xzero, + fuzzy_or([ymod < pi/2, ymod > 3*pi/2]) + ]) + ]) + + + def _eval_is_nonnegative(self): + z = self.args[0] + + x, y = z.as_real_imag() + ymod = y % (2*pi) + + yzero = ymod.is_zero + # shortcut if ymod is zero + if yzero: + return True + + xzero = x.is_zero + # shortcut x is not zero + if xzero is False: + return yzero + + return fuzzy_or([ + # Case 1: + yzero, + # Case 2: + fuzzy_and([ + xzero, + fuzzy_or([ymod <= pi/2, ymod >= 3*pi/2]) + ]) + ]) + + def _eval_is_finite(self): + arg = self.args[0] + return arg.is_finite + + def _eval_is_zero(self): + rest, ipi_mult = _peeloff_ipi(self.args[0]) + if ipi_mult and rest.is_zero: + return (ipi_mult - S.Half).is_integer + + +class tanh(HyperbolicFunction): + r""" + ``tanh(x)`` is the hyperbolic tangent of ``x``. + + The hyperbolic tangent function is $\frac{\sinh(x)}{\cosh(x)}$. + + Examples + ======== + + >>> from sympy import tanh + >>> from sympy.abc import x + >>> tanh(x) + tanh(x) + + See Also + ======== + + sinh, cosh, atanh + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return S.One - tanh(self.args[0])**2 + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return atanh + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.One + elif arg is S.NegativeInfinity: + return S.NegativeOne + elif arg.is_zero: + return S.Zero + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.NaN + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + if i_coeff.could_extract_minus_sign(): + return -I * tan(-i_coeff) + return I * tan(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_Add: + x, m = _peeloff_ipi(arg) + if m: + tanhm = tanh(m*pi*I) + if tanhm is S.ComplexInfinity: + return coth(x) + else: # tanhm == 0 + return tanh(x) + + if arg.is_zero: + return S.Zero + + if arg.func == asinh: + x = arg.args[0] + return x/sqrt(1 + x**2) + + if arg.func == acosh: + x = arg.args[0] + return sqrt(x - 1) * sqrt(x + 1) / x + + if arg.func == atanh: + return arg.args[0] + + if arg.func == acoth: + return 1/arg.args[0] + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + a = 2**(n + 1) + + B = bernoulli(n + 1) + F = factorial(n + 1) + + return a*(a - 1) * B/F * x**n + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.expand(deep, **hints), S.Zero) + else: + return (self, S.Zero) + if deep: + re, im = self.args[0].expand(deep, **hints).as_real_imag() + else: + re, im = self.args[0].as_real_imag() + denom = sinh(re)**2 + cos(im)**2 + return (sinh(re)*cosh(re)/denom, sin(im)*cos(im)/denom) + + def _eval_expand_trig(self, **hints): + arg = self.args[0] + if arg.is_Add: + n = len(arg.args) + TX = [tanh(x, evaluate=False)._eval_expand_trig() + for x in arg.args] + p = [0, 0] # [den, num] + for i in range(n + 1): + p[i % 2] += symmetric_poly(i, TX) + return p[1]/p[0] + elif arg.is_Mul: + coeff, terms = arg.as_coeff_Mul() + if coeff.is_Integer and coeff > 1: + T = tanh(terms) + n = [nC(range(coeff), k)*T**k for k in range(1, coeff + 1, 2)] + d = [nC(range(coeff), k)*T**k for k in range(0, coeff + 1, 2)] + return Add(*n)/Add(*d) + return tanh(arg) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + neg_exp, pos_exp = exp(-arg), exp(arg) + return (pos_exp - neg_exp)/(pos_exp + neg_exp) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + neg_exp, pos_exp = exp(-arg), exp(arg) + return (pos_exp - neg_exp)/(pos_exp + neg_exp) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + return -I * tan(I * arg, evaluate=False) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + return -I / cot(I * arg, evaluate=False) + + def _eval_rewrite_as_sinh(self, arg, **kwargs): + return I*sinh(arg)/sinh(pi*I/2 - arg, evaluate=False) + + def _eval_rewrite_as_cosh(self, arg, **kwargs): + return I*cosh(pi*I/2 - arg, evaluate=False)/cosh(arg) + + def _eval_rewrite_as_coth(self, arg, **kwargs): + return 1/coth(arg) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.series.order import Order + arg = self.args[0].as_leading_term(x) + + if x in arg.free_symbols and Order(1, x).contains(arg): + return arg + else: + return self.func(arg) + + def _eval_is_real(self): + arg = self.args[0] + if arg.is_real: + return True + + re, im = arg.as_real_imag() + + # if denom = 0, tanh(arg) = zoo + if re == 0 and im % pi == pi/2: + return None + + # check if im is of the form n*pi/2 to make sin(2*im) = 0 + # if not, im could be a number, return False in that case + return (im % (pi/2)).is_zero + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + + def _eval_is_positive(self): + if self.args[0].is_extended_real: + return self.args[0].is_positive + + def _eval_is_negative(self): + if self.args[0].is_extended_real: + return self.args[0].is_negative + + def _eval_is_finite(self): + arg = self.args[0] + + re, im = arg.as_real_imag() + denom = cos(im)**2 + sinh(re)**2 + if denom == 0: + return False + elif denom.is_number: + return True + if arg.is_extended_real: + return True + + def _eval_is_zero(self): + arg = self.args[0] + if arg.is_zero: + return True + + +class coth(HyperbolicFunction): + r""" + ``coth(x)`` is the hyperbolic cotangent of ``x``. + + The hyperbolic cotangent function is $\frac{\cosh(x)}{\sinh(x)}$. + + Examples + ======== + + >>> from sympy import coth + >>> from sympy.abc import x + >>> coth(x) + coth(x) + + See Also + ======== + + sinh, cosh, acoth + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return -1/sinh(self.args[0])**2 + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return acoth + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.One + elif arg is S.NegativeInfinity: + return S.NegativeOne + elif arg.is_zero: + return S.ComplexInfinity + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.NaN + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + if i_coeff.could_extract_minus_sign(): + return I * cot(-i_coeff) + return -I * cot(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_Add: + x, m = _peeloff_ipi(arg) + if m: + cothm = coth(m*pi*I) + if cothm is S.ComplexInfinity: + return coth(x) + else: # cothm == 0 + return tanh(x) + + if arg.is_zero: + return S.ComplexInfinity + + if arg.func == asinh: + x = arg.args[0] + return sqrt(1 + x**2)/x + + if arg.func == acosh: + x = arg.args[0] + return x/(sqrt(x - 1) * sqrt(x + 1)) + + if arg.func == atanh: + return 1/arg.args[0] + + if arg.func == acoth: + return arg.args[0] + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return 1 / sympify(x) + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + B = bernoulli(n + 1) + F = factorial(n + 1) + + return 2**(n + 1) * B/F * x**n + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + from sympy.functions.elementary.trigonometric import (cos, sin) + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.expand(deep, **hints), S.Zero) + else: + return (self, S.Zero) + if deep: + re, im = self.args[0].expand(deep, **hints).as_real_imag() + else: + re, im = self.args[0].as_real_imag() + denom = sinh(re)**2 + sin(im)**2 + return (sinh(re)*cosh(re)/denom, -sin(im)*cos(im)/denom) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + neg_exp, pos_exp = exp(-arg), exp(arg) + return (pos_exp + neg_exp)/(pos_exp - neg_exp) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + neg_exp, pos_exp = exp(-arg), exp(arg) + return (pos_exp + neg_exp)/(pos_exp - neg_exp) + + def _eval_rewrite_as_sinh(self, arg, **kwargs): + return -I*sinh(pi*I/2 - arg, evaluate=False)/sinh(arg) + + def _eval_rewrite_as_cosh(self, arg, **kwargs): + return -I*cosh(arg)/cosh(pi*I/2 - arg, evaluate=False) + + def _eval_rewrite_as_tanh(self, arg, **kwargs): + return 1/tanh(arg) + + def _eval_is_positive(self): + if self.args[0].is_extended_real: + return self.args[0].is_positive + + def _eval_is_negative(self): + if self.args[0].is_extended_real: + return self.args[0].is_negative + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.series.order import Order + arg = self.args[0].as_leading_term(x) + + if x in arg.free_symbols and Order(1, x).contains(arg): + return 1/arg + else: + return self.func(arg) + + def _eval_expand_trig(self, **hints): + arg = self.args[0] + if arg.is_Add: + CX = [coth(x, evaluate=False)._eval_expand_trig() for x in arg.args] + p = [[], []] + n = len(arg.args) + for i in range(n, -1, -1): + p[(n - i) % 2].append(symmetric_poly(i, CX)) + return Add(*p[0])/Add(*p[1]) + elif arg.is_Mul: + coeff, x = arg.as_coeff_Mul(rational=True) + if coeff.is_Integer and coeff > 1: + c = coth(x, evaluate=False) + p = [[], []] + for i in range(coeff, -1, -1): + p[(coeff - i) % 2].append(binomial(coeff, i)*c**i) + return Add(*p[0])/Add(*p[1]) + return coth(arg) + + +class ReciprocalHyperbolicFunction(HyperbolicFunction): + """Base class for reciprocal functions of hyperbolic functions. """ + + #To be defined in class + _reciprocal_of = None + _is_even: FuzzyBool = None + _is_odd: FuzzyBool = None + + @classmethod + def eval(cls, arg): + if arg.could_extract_minus_sign(): + if cls._is_even: + return cls(-arg) + if cls._is_odd: + return -cls(-arg) + + t = cls._reciprocal_of.eval(arg) + if hasattr(arg, 'inverse') and arg.inverse() == cls: + return arg.args[0] + return 1/t if t is not None else t + + def _call_reciprocal(self, method_name, *args, **kwargs): + # Calls method_name on _reciprocal_of + o = self._reciprocal_of(self.args[0]) + return getattr(o, method_name)(*args, **kwargs) + + def _calculate_reciprocal(self, method_name, *args, **kwargs): + # If calling method_name on _reciprocal_of returns a value != None + # then return the reciprocal of that value + t = self._call_reciprocal(method_name, *args, **kwargs) + return 1/t if t is not None else t + + def _rewrite_reciprocal(self, method_name, arg): + # Special handling for rewrite functions. If reciprocal rewrite returns + # unmodified expression, then return None + t = self._call_reciprocal(method_name, arg) + if t is not None and t != self._reciprocal_of(arg): + return 1/t + + def _eval_rewrite_as_exp(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_exp", arg) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_tractable", arg) + + def _eval_rewrite_as_tanh(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_tanh", arg) + + def _eval_rewrite_as_coth(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_coth", arg) + + def as_real_imag(self, deep = True, **hints): + return (1 / self._reciprocal_of(self.args[0])).as_real_imag(deep, **hints) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def _eval_expand_complex(self, deep=True, **hints): + re_part, im_part = self.as_real_imag(deep=True, **hints) + return re_part + I*im_part + + def _eval_expand_trig(self, **hints): + return self._calculate_reciprocal("_eval_expand_trig", **hints) + + def _eval_as_leading_term(self, x, logx, cdir): + return (1/self._reciprocal_of(self.args[0]))._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_is_extended_real(self): + return self._reciprocal_of(self.args[0]).is_extended_real + + def _eval_is_finite(self): + return (1/self._reciprocal_of(self.args[0])).is_finite + + +class csch(ReciprocalHyperbolicFunction): + r""" + ``csch(x)`` is the hyperbolic cosecant of ``x``. + + The hyperbolic cosecant function is $\frac{2}{e^x - e^{-x}}$ + + Examples + ======== + + >>> from sympy import csch + >>> from sympy.abc import x + >>> csch(x) + csch(x) + + See Also + ======== + + sinh, cosh, tanh, sech, asinh, acosh + """ + + _reciprocal_of = sinh + _is_odd = True + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function + """ + if argindex == 1: + return -coth(self.args[0]) * csch(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + """ + Returns the next term in the Taylor series expansion + """ + if n == 0: + return 1/sympify(x) + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + B = bernoulli(n + 1) + F = factorial(n + 1) + + return 2 * (1 - 2**n) * B/F * x**n + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return I / sin(I * arg, evaluate=False) + + def _eval_rewrite_as_csc(self, arg, **kwargs): + return I * csc(I * arg, evaluate=False) + + def _eval_rewrite_as_cosh(self, arg, **kwargs): + return I / cosh(arg + I * pi / 2, evaluate=False) + + def _eval_rewrite_as_sinh(self, arg, **kwargs): + return 1 / sinh(arg) + + def _eval_is_positive(self): + if self.args[0].is_extended_real: + return self.args[0].is_positive + + def _eval_is_negative(self): + if self.args[0].is_extended_real: + return self.args[0].is_negative + + +class sech(ReciprocalHyperbolicFunction): + r""" + ``sech(x)`` is the hyperbolic secant of ``x``. + + The hyperbolic secant function is $\frac{2}{e^x + e^{-x}}$ + + Examples + ======== + + >>> from sympy import sech + >>> from sympy.abc import x + >>> sech(x) + sech(x) + + See Also + ======== + + sinh, cosh, tanh, coth, csch, asinh, acosh + """ + + _reciprocal_of = cosh + _is_even = True + + def fdiff(self, argindex=1): + if argindex == 1: + return - tanh(self.args[0])*sech(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + return euler(n) / factorial(n) * x**(n) + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return 1 / cos(I * arg, evaluate=False) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + return sec(I * arg, evaluate=False) + + def _eval_rewrite_as_sinh(self, arg, **kwargs): + return I / sinh(arg + I * pi /2, evaluate=False) + + def _eval_rewrite_as_cosh(self, arg, **kwargs): + return 1 / cosh(arg) + + def _eval_is_positive(self): + if self.args[0].is_extended_real: + return True + + +############################################################################### +############################# HYPERBOLIC INVERSES ############################# +############################################################################### + +class InverseHyperbolicFunction(DefinedFunction): + """Base class for inverse hyperbolic functions.""" + + pass + + +class asinh(InverseHyperbolicFunction): + """ + ``asinh(x)`` is the inverse hyperbolic sine of ``x``. + + The inverse hyperbolic sine function. + + Examples + ======== + + >>> from sympy import asinh + >>> from sympy.abc import x + >>> asinh(x).diff(x) + 1/sqrt(x**2 + 1) + >>> asinh(1) + log(1 + sqrt(2)) + + See Also + ======== + + acosh, atanh, sinh + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/sqrt(self.args[0]**2 + 1) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.NegativeInfinity + elif arg.is_zero: + return S.Zero + elif arg is S.One: + return log(sqrt(2) + 1) + elif arg is S.NegativeOne: + return log(sqrt(2) - 1) + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.ComplexInfinity + + if arg.is_zero: + return S.Zero + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + return I * asin(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if isinstance(arg, sinh) and arg.args[0].is_number: + z = arg.args[0] + if z.is_real: + return z + r, i = match_real_imag(z) + if r is not None and i is not None: + f = floor((i + pi/2)/pi) + m = z - I*pi*f + even = f.is_even + if even is True: + return m + elif even is False: + return -m + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) >= 2 and n > 2: + p = previous_terms[-2] + return -p * (n - 2)**2/(n*(n - 1)) * x**2 + else: + k = (n - 1) // 2 + R = RisingFactorial(S.Half, k) + F = factorial(k) + return S.NegativeOne**k * R / F * x**n / n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0.is_zero: + return arg.as_leading_term(x) + + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + # Handling branch points + if x0 in (-I, I, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + # Handling points lying on branch cuts (-I*oo, -I) U (I, I*oo) + if (1 + x0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if re(ndir).is_positive: + if im(x0).is_negative: + return -self.func(x0) - I*pi + elif re(ndir).is_negative: + if im(x0).is_positive: + return -self.func(x0) + I*pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # asinh + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 in (I, -I): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts (-I*oo, -I) U (I, I*oo) + if (1 + arg0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if re(ndir).is_positive: + if im(arg0).is_negative: + return -res - I*pi + elif re(ndir).is_negative: + if im(arg0).is_positive: + return -res + I*pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return log(x + sqrt(x**2 + 1)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_atanh(self, x, **kwargs): + return atanh(x/sqrt(1 + x**2)) + + def _eval_rewrite_as_acosh(self, x, **kwargs): + ix = I*x + return I*(sqrt(1 - ix)/sqrt(ix - 1) * acosh(ix) - pi/2) + + def _eval_rewrite_as_asin(self, x, **kwargs): + return -I * asin(I * x, evaluate=False) + + def _eval_rewrite_as_acos(self, x, **kwargs): + return I * acos(I * x, evaluate=False) - I*pi/2 + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return sinh + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + def _eval_is_finite(self): + return self.args[0].is_finite + + +class acosh(InverseHyperbolicFunction): + """ + ``acosh(x)`` is the inverse hyperbolic cosine of ``x``. + + The inverse hyperbolic cosine function. + + Examples + ======== + + >>> from sympy import acosh + >>> from sympy.abc import x + >>> acosh(x).diff(x) + 1/(sqrt(x - 1)*sqrt(x + 1)) + >>> acosh(1) + 0 + + See Also + ======== + + asinh, atanh, cosh + """ + + def fdiff(self, argindex=1): + if argindex == 1: + arg = self.args[0] + return 1/(sqrt(arg - 1)*sqrt(arg + 1)) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Infinity + elif arg.is_zero: + return pi*I / 2 + elif arg is S.One: + return S.Zero + elif arg is S.NegativeOne: + return pi*I + + if arg.is_number: + cst_table = _acosh_table() + + if arg in cst_table: + if arg.is_extended_real: + return cst_table[arg]*I + return cst_table[arg] + + if arg is S.ComplexInfinity: + return S.ComplexInfinity + if arg == I*S.Infinity: + return S.Infinity + I*pi/2 + if arg == -I*S.Infinity: + return S.Infinity - I*pi/2 + + if arg.is_zero: + return pi*I*S.Half + + if isinstance(arg, cosh) and arg.args[0].is_number: + z = arg.args[0] + if z.is_real: + return Abs(z) + r, i = match_real_imag(z) + if r is not None and i is not None: + f = floor(i/pi) + m = z - I*pi*f + even = f.is_even + if even is True: + if r.is_nonnegative: + return m + elif r.is_negative: + return -m + elif even is False: + m -= I*pi + if r.is_nonpositive: + return -m + elif r.is_positive: + return m + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return I*pi/2 + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) >= 2 and n > 2: + p = previous_terms[-2] + return p * (n - 2)**2/(n*(n - 1)) * x**2 + else: + k = (n - 1) // 2 + R = RisingFactorial(S.Half, k) + F = factorial(k) + return -R / F * I * x**n / n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + # Handling branch points + if x0 in (-S.One, S.Zero, S.One, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + # Handling points lying on branch cuts (-oo, 1) + if (x0 - 1).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if (x0 + 1).is_negative: + return self.func(x0) - 2*I*pi + return -self.func(x0) + elif not im(ndir).is_positive: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # acosh + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 in (S.One, S.NegativeOne): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts (-oo, 1) + if (arg0 - 1).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if (arg0 + 1).is_negative: + return res - 2*I*pi + return -res + elif not im(ndir).is_positive: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return log(x + sqrt(x + 1) * sqrt(x - 1)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_acos(self, x, **kwargs): + return sqrt(x - 1)/sqrt(1 - x) * acos(x) + + def _eval_rewrite_as_asin(self, x, **kwargs): + return sqrt(x - 1)/sqrt(1 - x) * (pi/2 - asin(x)) + + def _eval_rewrite_as_asinh(self, x, **kwargs): + return sqrt(x - 1)/sqrt(1 - x) * (pi/2 + I*asinh(I*x, evaluate=False)) + + def _eval_rewrite_as_atanh(self, x, **kwargs): + sxm1 = sqrt(x - 1) + s1mx = sqrt(1 - x) + sx2m1 = sqrt(x**2 - 1) + return (pi/2*sxm1/s1mx*(1 - x * sqrt(1/x**2)) + + sxm1*sqrt(x + 1)/sx2m1 * atanh(sx2m1/x)) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return cosh + + def _eval_is_zero(self): + if (self.args[0] - 1).is_zero: + return True + + def _eval_is_extended_real(self): + return fuzzy_and([self.args[0].is_extended_real, (self.args[0] - 1).is_extended_nonnegative]) + + def _eval_is_finite(self): + return self.args[0].is_finite + + +class atanh(InverseHyperbolicFunction): + """ + ``atanh(x)`` is the inverse hyperbolic tangent of ``x``. + + The inverse hyperbolic tangent function. + + Examples + ======== + + >>> from sympy import atanh + >>> from sympy.abc import x + >>> atanh(x).diff(x) + 1/(1 - x**2) + + See Also + ======== + + asinh, acosh, tanh + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/(1 - self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg.is_zero: + return S.Zero + elif arg is S.One: + return S.Infinity + elif arg is S.NegativeOne: + return S.NegativeInfinity + elif arg is S.Infinity: + return -I * atan(arg) + elif arg is S.NegativeInfinity: + return I * atan(-arg) + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + from sympy.calculus.accumulationbounds import AccumBounds + return I*AccumBounds(-pi/2, pi/2) + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + return I * atan(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_zero: + return S.Zero + + if isinstance(arg, tanh) and arg.args[0].is_number: + z = arg.args[0] + if z.is_real: + return z + r, i = match_real_imag(z) + if r is not None and i is not None: + f = floor(2*i/pi) + even = f.is_even + m = z - I*f*pi/2 + if even is True: + return m + elif even is False: + return m - I*pi/2 + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + return x**n / n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0.is_zero: + return arg.as_leading_term(x) + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + # Handling branch points + if x0 in (-S.One, S.One, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + # Handling points lying on branch cuts (-oo, -1] U [1, oo) + if (1 - x0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_negative: + return self.func(x0) - I*pi + elif im(ndir).is_positive: + if x0.is_positive: + return self.func(x0) + I*pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # atanh + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 in (S.One, S.NegativeOne): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts (-oo, -1] U [1, oo) + if (1 - arg0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_negative: + return res - I*pi + elif im(ndir).is_positive: + if arg0.is_positive: + return res + I*pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return (log(1 + x) - log(1 - x)) / 2 + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_asinh(self, x, **kwargs): + f = sqrt(1/(x**2 - 1)) + return (pi*x/(2*sqrt(-x**2)) - + sqrt(-x)*sqrt(1 - x**2)/sqrt(x)*f*asinh(f)) + + def _eval_is_zero(self): + if self.args[0].is_zero: + return True + + def _eval_is_extended_real(self): + return fuzzy_and([self.args[0].is_extended_real, (1 - self.args[0]).is_nonnegative, (self.args[0] + 1).is_nonnegative]) + + def _eval_is_finite(self): + return fuzzy_not(fuzzy_or([(self.args[0] - 1).is_zero, (self.args[0] + 1).is_zero])) + + def _eval_is_imaginary(self): + return self.args[0].is_imaginary + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return tanh + + +class acoth(InverseHyperbolicFunction): + """ + ``acoth(x)`` is the inverse hyperbolic cotangent of ``x``. + + The inverse hyperbolic cotangent function. + + Examples + ======== + + >>> from sympy import acoth + >>> from sympy.abc import x + >>> acoth(x).diff(x) + 1/(1 - x**2) + + See Also + ======== + + asinh, acosh, coth + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/(1 - self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return pi*I / 2 + elif arg is S.One: + return S.Infinity + elif arg is S.NegativeOne: + return S.NegativeInfinity + elif arg.is_negative: + return -cls(-arg) + else: + if arg is S.ComplexInfinity: + return S.Zero + + i_coeff = _imaginary_unit_as_coefficient(arg) + + if i_coeff is not None: + return -I * acot(i_coeff) + else: + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_zero: + return pi*I*S.Half + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return -I*pi/2 + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + return x**n / n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.ComplexInfinity: + return (1/arg).as_leading_term(x) + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + # Handling branch points + if x0 in (-S.One, S.One, S.Zero): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + # Handling points lying on branch cuts [-1, 1] + if x0.is_real and (1 - x0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_positive: + return self.func(x0) + I*pi + elif im(ndir).is_positive: + if x0.is_negative: + return self.func(x0) - I*pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # acoth + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 in (S.One, S.NegativeOne): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts [-1, 1] + if arg0.is_real and (1 - arg0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_positive: + return res + I*pi + elif im(ndir).is_positive: + if arg0.is_negative: + return res - I*pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return (log(1 + 1/x) - log(1 - 1/x)) / 2 + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_atanh(self, x, **kwargs): + return atanh(1/x) + + def _eval_rewrite_as_asinh(self, x, **kwargs): + return (pi*I/2*(sqrt((x - 1)/x)*sqrt(x/(x - 1)) - sqrt(1 + 1/x)*sqrt(x/(x + 1))) + + x*sqrt(1/x**2)*asinh(sqrt(1/(x**2 - 1)))) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return coth + + def _eval_is_extended_real(self): + return fuzzy_and([self.args[0].is_extended_real, fuzzy_or([(self.args[0] - 1).is_extended_nonnegative, (self.args[0] + 1).is_extended_nonpositive])]) + + def _eval_is_finite(self): + return fuzzy_not(fuzzy_or([(self.args[0] - 1).is_zero, (self.args[0] + 1).is_zero])) + + +class asech(InverseHyperbolicFunction): + """ + ``asech(x)`` is the inverse hyperbolic secant of ``x``. + + The inverse hyperbolic secant function. + + Examples + ======== + + >>> from sympy import asech, sqrt, S + >>> from sympy.abc import x + >>> asech(x).diff(x) + -1/(x*sqrt(1 - x**2)) + >>> asech(1).diff(x) + 0 + >>> asech(1) + 0 + >>> asech(S(2)) + I*pi/3 + >>> asech(-sqrt(2)) + 3*I*pi/4 + >>> asech((sqrt(6) - sqrt(2))) + I*pi/12 + + See Also + ======== + + asinh, atanh, cosh, acoth + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hyperbolic_function + .. [2] https://dlmf.nist.gov/4.37 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcSech/ + + """ + + def fdiff(self, argindex=1): + if argindex == 1: + z = self.args[0] + return -1/(z*sqrt(1 - z**2)) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return pi*I / 2 + elif arg is S.NegativeInfinity: + return pi*I / 2 + elif arg.is_zero: + return S.Infinity + elif arg is S.One: + return S.Zero + elif arg is S.NegativeOne: + return pi*I + + if arg.is_number: + cst_table = _asech_table() + + if arg in cst_table: + if arg.is_extended_real: + return cst_table[arg]*I + return cst_table[arg] + + if arg is S.ComplexInfinity: + from sympy.calculus.accumulationbounds import AccumBounds + return I*AccumBounds(-pi/2, pi/2) + + if arg.is_zero: + return S.Infinity + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return log(2 / x) + elif n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 2 and n > 2: + p = previous_terms[-2] + return p * ((n - 1)*(n-2)) * x**2/(4 * (n//2)**2) + else: + k = n // 2 + R = RisingFactorial(S.Half, k) * n + F = factorial(k) * n // 2 * n // 2 + return -1 * R / F * x**n / 4 + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + # Handling branch points + if x0 in (-S.One, S.Zero, S.One, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + # Handling points lying on branch cuts (-oo, 0] U (1, oo) + if x0.is_negative or (1 - x0).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_positive: + if x0.is_positive or (x0 + 1).is_negative: + return -self.func(x0) + return self.func(x0) - 2*I*pi + elif not im(ndir).is_negative: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # asech + from sympy.series.order import O + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 is S.One: + t = Dummy('t', positive=True) + ser = asech(S.One - t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One - self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + if arg0 is S.NegativeOne: + t = Dummy('t', positive=True) + ser = asech(S.NegativeOne + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else I*pi + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts (-oo, 0] U (1, oo) + if arg0.is_negative or (1 - arg0).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_positive: + if arg0.is_positive or (arg0 + 1).is_negative: + return -res + return res - 2*I*pi + elif not im(ndir).is_negative: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return sech + + def _eval_rewrite_as_log(self, arg, **kwargs): + return log(1/arg + sqrt(1/arg - 1) * sqrt(1/arg + 1)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_acosh(self, arg, **kwargs): + return acosh(1/arg) + + def _eval_rewrite_as_asinh(self, arg, **kwargs): + return sqrt(1/arg - 1)/sqrt(1 - 1/arg)*(I*asinh(I/arg, evaluate=False) + + pi*S.Half) + + def _eval_rewrite_as_atanh(self, x, **kwargs): + return (I*pi*(1 - sqrt(x)*sqrt(1/x) - I/2*sqrt(-x)/sqrt(x) - I/2*sqrt(x**2)/sqrt(-x**2)) + + sqrt(1/(x + 1))*sqrt(x + 1)*atanh(sqrt(1 - x**2))) + + def _eval_rewrite_as_acsch(self, x, **kwargs): + return sqrt(1/x - 1)/sqrt(1 - 1/x)*(pi/2 - I*acsch(I*x, evaluate=False)) + + def _eval_is_extended_real(self): + return fuzzy_and([self.args[0].is_extended_real, self.args[0].is_nonnegative, (1 - self.args[0]).is_nonnegative]) + + def _eval_is_finite(self): + return fuzzy_not(self.args[0].is_zero) + + +class acsch(InverseHyperbolicFunction): + """ + ``acsch(x)`` is the inverse hyperbolic cosecant of ``x``. + + The inverse hyperbolic cosecant function. + + Examples + ======== + + >>> from sympy import acsch, sqrt, I + >>> from sympy.abc import x + >>> acsch(x).diff(x) + -1/(x**2*sqrt(1 + x**(-2))) + >>> acsch(1).diff(x) + 0 + >>> acsch(1) + log(1 + sqrt(2)) + >>> acsch(I) + -I*pi/2 + >>> acsch(-2*I) + I*pi/6 + >>> acsch(I*(sqrt(6) - sqrt(2))) + -5*I*pi/12 + + See Also + ======== + + asinh + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hyperbolic_function + .. [2] https://dlmf.nist.gov/4.37 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcCsch/ + + """ + + def fdiff(self, argindex=1): + if argindex == 1: + z = self.args[0] + return -1/(z**2*sqrt(1 + 1/z**2)) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return S.ComplexInfinity + elif arg is S.One: + return log(1 + sqrt(2)) + elif arg is S.NegativeOne: + return - log(1 + sqrt(2)) + + if arg.is_number: + cst_table = _acsch_table() + + if arg in cst_table: + return cst_table[arg]*I + + if arg is S.ComplexInfinity: + return S.Zero + + if arg.is_infinite: + return S.Zero + + if arg.is_zero: + return S.ComplexInfinity + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return log(2 / x) + elif n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 2 and n > 2: + p = previous_terms[-2] + return -p * ((n - 1)*(n-2)) * x**2/(4 * (n//2)**2) + else: + k = n // 2 + R = RisingFactorial(S.Half, k) * n + F = factorial(k) * n // 2 * n // 2 + return S.NegativeOne**(k +1) * R / F * x**n / 4 + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + # Handling branch points + if x0 in (-I, I, S.Zero): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + if x0 is S.NaN: + expr = self.func(arg.as_leading_term(x)) + if expr.is_finite: + return expr + else: + return self + + if x0 is S.ComplexInfinity: + return (1/arg).as_leading_term(x) + # Handling points lying on branch cuts (-I, I) + if x0.is_imaginary and (1 + x0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if re(ndir).is_positive: + if im(x0).is_positive: + return -self.func(x0) - I*pi + elif re(ndir).is_negative: + if im(x0).is_negative: + return -self.func(x0) + I*pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # acsch + from sympy.series.order import O + arg = self.args[0] + arg0 = arg.subs(x, 0) + + # Handling branch points + if arg0 is I: + t = Dummy('t', positive=True) + ser = acsch(I + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = -I + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else -I*pi/2 + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + res = ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + return res + + if arg0 == S.NegativeOne*I: + t = Dummy('t', positive=True) + ser = acsch(-I + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = I + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else I*pi/2 + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + + # Handling points lying on branch cuts (-I, I) + if arg0.is_imaginary and (1 + arg0**2).is_positive: + ndir = self.args[0].dir(x, cdir if cdir else 1) + if re(ndir).is_positive: + if im(arg0).is_positive: + return -res - I*pi + elif re(ndir).is_negative: + if im(arg0).is_negative: + return -res + I*pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return csch + + def _eval_rewrite_as_log(self, arg, **kwargs): + return log(1/arg + sqrt(1/arg**2 + 1)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_asinh(self, arg, **kwargs): + return asinh(1/arg) + + def _eval_rewrite_as_acosh(self, arg, **kwargs): + return I*(sqrt(1 - I/arg)/sqrt(I/arg - 1)* + acosh(I/arg, evaluate=False) - pi*S.Half) + + def _eval_rewrite_as_atanh(self, arg, **kwargs): + arg2 = arg**2 + arg2p1 = arg2 + 1 + return sqrt(-arg2)/arg*(pi*S.Half - + sqrt(-arg2p1**2)/arg2p1*atanh(sqrt(arg2p1))) + + def _eval_is_zero(self): + return self.args[0].is_infinite + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + def _eval_is_finite(self): + return fuzzy_not(self.args[0].is_zero) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/integers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/integers.py new file mode 100644 index 0000000000000000000000000000000000000000..d0b58d32399144c39133855475d70c01b70b1a3f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/integers.py @@ -0,0 +1,710 @@ +from __future__ import annotations + +from sympy.core.basic import Basic +from sympy.core.expr import Expr + +from sympy.core import Add, S +from sympy.core.evalf import get_integer_part, PrecisionExhausted +from sympy.core.function import DefinedFunction +from sympy.core.logic import fuzzy_or, fuzzy_and +from sympy.core.numbers import Integer, int_valued +from sympy.core.relational import Gt, Lt, Ge, Le, Relational, is_eq, is_le, is_lt +from sympy.core.sympify import _sympify +from sympy.functions.elementary.complexes import im, re +from sympy.multipledispatch import dispatch + +############################################################################### +######################### FLOOR and CEILING FUNCTIONS ######################### +############################################################################### + + +class RoundFunction(DefinedFunction): + """Abstract base class for rounding functions.""" + + args: tuple[Expr] + + @classmethod + def eval(cls, arg): + if (v := cls._eval_number(arg)) is not None: + return v + if (v := cls._eval_const_number(arg)) is not None: + return v + + if arg.is_integer or arg.is_finite is False: + return arg + if arg.is_imaginary or (S.ImaginaryUnit*arg).is_real: + i = im(arg) + if not i.has(S.ImaginaryUnit): + return cls(i)*S.ImaginaryUnit + return cls(arg, evaluate=False) + + # Integral, numerical, symbolic part + ipart = npart = spart = S.Zero + + # Extract integral (or complex integral) terms + intof = lambda x: int(x) if int_valued(x) else ( + x if x.is_integer else None) + for t in Add.make_args(arg): + if t.is_imaginary and (i := intof(im(t))) is not None: + ipart += i*S.ImaginaryUnit + elif (i := intof(t)) is not None: + ipart += i + elif t.is_number: + npart += t + else: + spart += t + + if not (npart or spart): + return ipart + + # Evaluate npart numerically if independent of spart + if npart and ( + not spart or + npart.is_real and (spart.is_imaginary or (S.ImaginaryUnit*spart).is_real) or + npart.is_imaginary and spart.is_real): + try: + r, i = get_integer_part( + npart, cls._dir, {}, return_ints=True) + ipart += Integer(r) + Integer(i)*S.ImaginaryUnit + npart = S.Zero + except (PrecisionExhausted, NotImplementedError): + pass + + spart += npart + if not spart: + return ipart + elif spart.is_imaginary or (S.ImaginaryUnit*spart).is_real: + return ipart + cls(im(spart), evaluate=False)*S.ImaginaryUnit + elif isinstance(spart, (floor, ceiling)): + return ipart + spart + else: + return ipart + cls(spart, evaluate=False) + + @classmethod + def _eval_number(cls, arg): + raise NotImplementedError() + + def _eval_is_finite(self): + return self.args[0].is_finite + + def _eval_is_real(self): + return self.args[0].is_real + + def _eval_is_integer(self): + return self.args[0].is_real + + +class floor(RoundFunction): + """ + Floor is a univariate function which returns the largest integer + value not greater than its argument. This implementation + generalizes floor to complex numbers by taking the floor of the + real and imaginary parts separately. + + Examples + ======== + + >>> from sympy import floor, E, I, S, Float, Rational + >>> floor(17) + 17 + >>> floor(Rational(23, 10)) + 2 + >>> floor(2*E) + 5 + >>> floor(-Float(0.567)) + -1 + >>> floor(-I/2) + -I + >>> floor(S(5)/2 + 5*I/2) + 2 + 2*I + + See Also + ======== + + sympy.functions.elementary.integers.ceiling + + References + ========== + + .. [1] "Concrete mathematics" by Graham, pp. 87 + .. [2] https://mathworld.wolfram.com/FloorFunction.html + + """ + _dir = -1 + + @classmethod + def _eval_number(cls, arg): + if arg.is_Number: + return arg.floor() + if any(isinstance(i, j) + for i in (arg, -arg) for j in (floor, ceiling)): + return arg + if arg.is_NumberSymbol: + return arg.approximation_interval(Integer)[0] + + @classmethod + def _eval_const_number(cls, arg): + if arg.is_real: + if arg.is_zero: + return S.Zero + if arg.is_positive: + num, den = arg.as_numer_denom() + s = den.is_negative + if s is None: + return None + if s: + num, den = -num, -den + # 0 <= num/den < 1 -> 0 + if is_lt(num, den): + return S.Zero + # 1 <= num/den < 2 -> 1 + if fuzzy_and([is_le(den, num), is_lt(num, 2*den)]): + return S.One + if arg.is_negative: + num, den = arg.as_numer_denom() + s = den.is_negative + if s is None: + return None + if s: + num, den = -num, -den + # -1 <= num/den < 0 -> -1 + if is_le(-den, num): + return S.NegativeOne + # -2 <= num/den < -1 -> -2 + if fuzzy_and([is_le(-2*den, num), is_lt(num, -den)]): + return Integer(-2) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + if arg0 is S.NaN or isinstance(arg0, AccumBounds): + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + r = floor(arg0) + if arg0.is_finite: + if arg0 == r: + ndir = arg.dir(x, cdir=cdir if cdir != 0 else 1) + if ndir.is_negative: + return r - 1 + elif ndir.is_positive: + return r + else: + raise NotImplementedError("Not sure of sign of %s" % ndir) + else: + return r + return arg.as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + r = floor(arg0) + if arg0.is_infinite: + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.series.order import Order + s = arg._eval_nseries(x, n, logx, cdir) + o = Order(1, (x, 0)) if n <= 0 else AccumBounds(-1, 0) + return s + o + if arg0 == r: + ndir = arg.dir(x, cdir=cdir if cdir != 0 else 1) + if ndir.is_negative: + return r - 1 + elif ndir.is_positive: + return r + else: + raise NotImplementedError("Not sure of sign of %s" % ndir) + else: + return r + + def _eval_is_negative(self): + return self.args[0].is_negative + + def _eval_is_nonnegative(self): + return self.args[0].is_nonnegative + + def _eval_rewrite_as_ceiling(self, arg, **kwargs): + return -ceiling(-arg) + + def _eval_rewrite_as_frac(self, arg, **kwargs): + return arg - frac(arg) + + def __le__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] < other + 1 + if other.is_number and other.is_real: + return self.args[0] < ceiling(other) + if self.args[0] == other and other.is_real: + return S.true + if other is S.Infinity and self.is_finite: + return S.true + + return Le(self, other, evaluate=False) + + def __ge__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] >= other + if other.is_number and other.is_real: + return self.args[0] >= ceiling(other) + if self.args[0] == other and other.is_real and other.is_noninteger: + return S.false + if other is S.NegativeInfinity and self.is_finite: + return S.true + + return Ge(self, other, evaluate=False) + + def __gt__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] >= other + 1 + if other.is_number and other.is_real: + return self.args[0] >= ceiling(other) + if self.args[0] == other and other.is_real: + return S.false + if other is S.NegativeInfinity and self.is_finite: + return S.true + + return Gt(self, other, evaluate=False) + + def __lt__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] < other + if other.is_number and other.is_real: + return self.args[0] < ceiling(other) + if self.args[0] == other and other.is_real and other.is_noninteger: + return S.true + if other is S.Infinity and self.is_finite: + return S.true + + return Lt(self, other, evaluate=False) + + +@dispatch(floor, Expr) +def _eval_is_eq(lhs, rhs): # noqa:F811 + return is_eq(lhs.rewrite(ceiling), rhs) or \ + is_eq(lhs.rewrite(frac),rhs) + + +class ceiling(RoundFunction): + """ + Ceiling is a univariate function which returns the smallest integer + value not less than its argument. This implementation + generalizes ceiling to complex numbers by taking the ceiling of the + real and imaginary parts separately. + + Examples + ======== + + >>> from sympy import ceiling, E, I, S, Float, Rational + >>> ceiling(17) + 17 + >>> ceiling(Rational(23, 10)) + 3 + >>> ceiling(2*E) + 6 + >>> ceiling(-Float(0.567)) + 0 + >>> ceiling(I/2) + I + >>> ceiling(S(5)/2 + 5*I/2) + 3 + 3*I + + See Also + ======== + + sympy.functions.elementary.integers.floor + + References + ========== + + .. [1] "Concrete mathematics" by Graham, pp. 87 + .. [2] https://mathworld.wolfram.com/CeilingFunction.html + + """ + _dir = 1 + + @classmethod + def _eval_number(cls, arg): + if arg.is_Number: + return arg.ceiling() + if any(isinstance(i, j) + for i in (arg, -arg) for j in (floor, ceiling)): + return arg + if arg.is_NumberSymbol: + return arg.approximation_interval(Integer)[1] + + @classmethod + def _eval_const_number(cls, arg): + if arg.is_real: + if arg.is_zero: + return S.Zero + if arg.is_positive: + num, den = arg.as_numer_denom() + s = den.is_negative + if s is None: + return None + if s: + num, den = -num, -den + # 0 < num/den <= 1 -> 1 + if is_le(num, den): + return S.One + # 1 < num/den <= 2 -> 2 + if fuzzy_and([is_lt(den, num), is_le(num, 2*den)]): + return Integer(2) + if arg.is_negative: + num, den = arg.as_numer_denom() + s = den.is_negative + if s is None: + return None + if s: + num, den = -num, -den + # -1 < num/den <= 0 -> 0 + if is_lt(-den, num): + return S.Zero + # -2 < num/den <= -1 -> -1 + if fuzzy_and([is_lt(-2*den, num), is_le(num, -den)]): + return S.NegativeOne + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + if arg0 is S.NaN or isinstance(arg0, AccumBounds): + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + r = ceiling(arg0) + if arg0.is_finite: + if arg0 == r: + ndir = arg.dir(x, cdir=cdir if cdir != 0 else 1) + if ndir.is_negative: + return r + elif ndir.is_positive: + return r + 1 + else: + raise NotImplementedError("Not sure of sign of %s" % ndir) + else: + return r + return arg.as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + r = ceiling(arg0) + if arg0.is_infinite: + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.series.order import Order + s = arg._eval_nseries(x, n, logx, cdir) + o = Order(1, (x, 0)) if n <= 0 else AccumBounds(0, 1) + return s + o + if arg0 == r: + ndir = arg.dir(x, cdir=cdir if cdir != 0 else 1) + if ndir.is_negative: + return r + elif ndir.is_positive: + return r + 1 + else: + raise NotImplementedError("Not sure of sign of %s" % ndir) + else: + return r + + def _eval_rewrite_as_floor(self, arg, **kwargs): + return -floor(-arg) + + def _eval_rewrite_as_frac(self, arg, **kwargs): + return arg + frac(-arg) + + def _eval_is_positive(self): + return self.args[0].is_positive + + def _eval_is_nonpositive(self): + return self.args[0].is_nonpositive + + def __lt__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] <= other - 1 + if other.is_number and other.is_real: + return self.args[0] <= floor(other) + if self.args[0] == other and other.is_real: + return S.false + if other is S.Infinity and self.is_finite: + return S.true + + return Lt(self, other, evaluate=False) + + def __gt__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] > other + if other.is_number and other.is_real: + return self.args[0] > floor(other) + if self.args[0] == other and other.is_real and other.is_noninteger: + return S.true + if other is S.NegativeInfinity and self.is_finite: + return S.true + + return Gt(self, other, evaluate=False) + + def __ge__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] > other - 1 + if other.is_number and other.is_real: + return self.args[0] > floor(other) + if self.args[0] == other and other.is_real: + return S.true + if other is S.NegativeInfinity and self.is_finite: + return S.true + + return Ge(self, other, evaluate=False) + + def __le__(self, other): + other = S(other) + if self.args[0].is_real: + if other.is_integer: + return self.args[0] <= other + if other.is_number and other.is_real: + return self.args[0] <= floor(other) + if self.args[0] == other and other.is_real and other.is_noninteger: + return S.false + if other is S.Infinity and self.is_finite: + return S.true + + return Le(self, other, evaluate=False) + + +@dispatch(ceiling, Basic) # type:ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return is_eq(lhs.rewrite(floor), rhs) or is_eq(lhs.rewrite(frac),rhs) + + +class frac(DefinedFunction): + r"""Represents the fractional part of x + + For real numbers it is defined [1]_ as + + .. math:: + x - \left\lfloor{x}\right\rfloor + + Examples + ======== + + >>> from sympy import Symbol, frac, Rational, floor, I + >>> frac(Rational(4, 3)) + 1/3 + >>> frac(-Rational(4, 3)) + 2/3 + + returns zero for integer arguments + + >>> n = Symbol('n', integer=True) + >>> frac(n) + 0 + + rewrite as floor + + >>> x = Symbol('x') + >>> frac(x).rewrite(floor) + x - floor(x) + + for complex arguments + + >>> r = Symbol('r', real=True) + >>> t = Symbol('t', real=True) + >>> frac(t + I*r) + I*frac(r) + frac(t) + + See Also + ======== + + sympy.functions.elementary.integers.floor + sympy.functions.elementary.integers.ceiling + + References + =========== + + .. [1] https://en.wikipedia.org/wiki/Fractional_part + .. [2] https://mathworld.wolfram.com/FractionalPart.html + + """ + @classmethod + def eval(cls, arg): + from sympy.calculus.accumulationbounds import AccumBounds + + def _eval(arg): + if arg in (S.Infinity, S.NegativeInfinity): + return AccumBounds(0, 1) + if arg.is_integer: + return S.Zero + if arg.is_number: + if arg is S.NaN: + return S.NaN + elif arg is S.ComplexInfinity: + return S.NaN + else: + return arg - floor(arg) + return cls(arg, evaluate=False) + + real, imag = S.Zero, S.Zero + for t in Add.make_args(arg): + # Two checks are needed for complex arguments + # see issue-7649 for details + if t.is_imaginary or (S.ImaginaryUnit*t).is_real: + i = im(t) + if not i.has(S.ImaginaryUnit): + imag += i + else: + real += t + else: + real += t + + real = _eval(real) + imag = _eval(imag) + return real + S.ImaginaryUnit*imag + + def _eval_rewrite_as_floor(self, arg, **kwargs): + return arg - floor(arg) + + def _eval_rewrite_as_ceiling(self, arg, **kwargs): + return arg + ceiling(-arg) + + def _eval_is_finite(self): + return True + + def _eval_is_real(self): + return self.args[0].is_extended_real + + def _eval_is_imaginary(self): + return self.args[0].is_imaginary + + def _eval_is_integer(self): + return self.args[0].is_integer + + def _eval_is_zero(self): + return fuzzy_or([self.args[0].is_zero, self.args[0].is_integer]) + + def _eval_is_negative(self): + return False + + def __ge__(self, other): + if self.is_extended_real: + other = _sympify(other) + # Check if other <= 0 + if other.is_extended_nonpositive: + return S.true + # Check if other >= 1 + res = self._value_one_or_more(other) + if res is not None: + return not(res) + return Ge(self, other, evaluate=False) + + def __gt__(self, other): + if self.is_extended_real: + other = _sympify(other) + # Check if other < 0 + res = self._value_one_or_more(other) + if res is not None: + return not(res) + # Check if other >= 1 + if other.is_extended_negative: + return S.true + return Gt(self, other, evaluate=False) + + def __le__(self, other): + if self.is_extended_real: + other = _sympify(other) + # Check if other < 0 + if other.is_extended_negative: + return S.false + # Check if other >= 1 + res = self._value_one_or_more(other) + if res is not None: + return res + return Le(self, other, evaluate=False) + + def __lt__(self, other): + if self.is_extended_real: + other = _sympify(other) + # Check if other <= 0 + if other.is_extended_nonpositive: + return S.false + # Check if other >= 1 + res = self._value_one_or_more(other) + if res is not None: + return res + return Lt(self, other, evaluate=False) + + def _value_one_or_more(self, other): + if other.is_extended_real: + if other.is_number: + res = other >= 1 + if res and not isinstance(res, Relational): + return S.true + if other.is_integer and other.is_positive: + return S.true + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + + if arg0.is_finite: + if r.is_zero: + ndir = arg.dir(x, cdir=cdir) + if ndir.is_negative: + return S.One + return (arg - arg0).as_leading_term(x, logx=logx, cdir=cdir) + else: + return r + elif arg0 in (S.ComplexInfinity, S.Infinity, S.NegativeInfinity): + return AccumBounds(0, 1) + return arg.as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.series.order import Order + arg = self.args[0] + arg0 = arg.subs(x, 0) + r = self.subs(x, 0) + + if arg0.is_infinite: + from sympy.calculus.accumulationbounds import AccumBounds + o = Order(1, (x, 0)) if n <= 0 else AccumBounds(0, 1) + Order(x**n, (x, 0)) + return o + else: + res = (arg - arg0)._eval_nseries(x, n, logx=logx, cdir=cdir) + if r.is_zero: + ndir = arg.dir(x, cdir=cdir) + res += S.One if ndir.is_negative else S.Zero + else: + res += r + return res + + +@dispatch(frac, Basic) # type:ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + if (lhs.rewrite(floor) == rhs) or \ + (lhs.rewrite(ceiling) == rhs): + return True + # Check if other < 0 + if rhs.is_extended_negative: + return False + # Check if other >= 1 + res = lhs._value_one_or_more(rhs) + if res is not None: + return False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/miscellaneous.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/miscellaneous.py new file mode 100644 index 0000000000000000000000000000000000000000..c7f3016bc7ea0d5c4ad778cf9922c941acb7fc44 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/miscellaneous.py @@ -0,0 +1,915 @@ +from sympy.core import S, sympify, NumberKind +from sympy.utilities.iterables import sift +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.operations import LatticeOp, ShortCircuit +from sympy.core.function import (Application, Lambda, + ArgumentIndexError, DefinedFunction) +from sympy.core.expr import Expr +from sympy.core.exprtools import factor_terms +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core.numbers import Rational +from sympy.core.power import Pow +from sympy.core.relational import Eq, Relational +from sympy.core.singleton import Singleton +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy +from sympy.core.rules import Transform +from sympy.core.logic import fuzzy_and, fuzzy_or, _torf +from sympy.core.traversal import walk +from sympy.core.numbers import Integer +from sympy.logic.boolalg import And, Or + + +def _minmax_as_Piecewise(op, *args): + # helper for Min/Max rewrite as Piecewise + from sympy.functions.elementary.piecewise import Piecewise + ec = [] + for i, a in enumerate(args): + c = [Relational(a, args[j], op) for j in range(i + 1, len(args))] + ec.append((a, And(*c))) + return Piecewise(*ec) + + +class IdentityFunction(Lambda, metaclass=Singleton): + """ + The identity function + + Examples + ======== + + >>> from sympy import Id, Symbol + >>> x = Symbol('x') + >>> Id(x) + x + + """ + + _symbol = Dummy('x') + + @property + def signature(self): + return Tuple(self._symbol) + + @property + def expr(self): + return self._symbol + + +Id = S.IdentityFunction + +############################################################################### +############################# ROOT and SQUARE ROOT FUNCTION ################### +############################################################################### + + +def sqrt(arg, evaluate=None): + """Returns the principal square root. + + Parameters + ========== + + evaluate : bool, optional + The parameter determines if the expression should be evaluated. + If ``None``, its value is taken from + ``global_parameters.evaluate``. + + Examples + ======== + + >>> from sympy import sqrt, Symbol, S + >>> x = Symbol('x') + + >>> sqrt(x) + sqrt(x) + + >>> sqrt(x)**2 + x + + Note that sqrt(x**2) does not simplify to x. + + >>> sqrt(x**2) + sqrt(x**2) + + This is because the two are not equal to each other in general. + For example, consider x == -1: + + >>> from sympy import Eq + >>> Eq(sqrt(x**2), x).subs(x, -1) + False + + This is because sqrt computes the principal square root, so the square may + put the argument in a different branch. This identity does hold if x is + positive: + + >>> y = Symbol('y', positive=True) + >>> sqrt(y**2) + y + + You can force this simplification by using the powdenest() function with + the force option set to True: + + >>> from sympy import powdenest + >>> sqrt(x**2) + sqrt(x**2) + >>> powdenest(sqrt(x**2), force=True) + x + + To get both branches of the square root you can use the rootof function: + + >>> from sympy import rootof + + >>> [rootof(x**2-3,i) for i in (0,1)] + [-sqrt(3), sqrt(3)] + + Although ``sqrt`` is printed, there is no ``sqrt`` function so looking for + ``sqrt`` in an expression will fail: + + >>> from sympy.utilities.misc import func_name + >>> func_name(sqrt(x)) + 'Pow' + >>> sqrt(x).has(sqrt) + False + + To find ``sqrt`` look for ``Pow`` with an exponent of ``1/2``: + + >>> (x + 1/sqrt(x)).find(lambda i: i.is_Pow and abs(i.exp) is S.Half) + {1/sqrt(x)} + + See Also + ======== + + sympy.polys.rootoftools.rootof, root, real_root + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Square_root + .. [2] https://en.wikipedia.org/wiki/Principal_value + """ + # arg = sympify(arg) is handled by Pow + return Pow(arg, S.Half, evaluate=evaluate) + + +def cbrt(arg, evaluate=None): + """Returns the principal cube root. + + Parameters + ========== + + evaluate : bool, optional + The parameter determines if the expression should be evaluated. + If ``None``, its value is taken from + ``global_parameters.evaluate``. + + Examples + ======== + + >>> from sympy import cbrt, Symbol + >>> x = Symbol('x') + + >>> cbrt(x) + x**(1/3) + + >>> cbrt(x)**3 + x + + Note that cbrt(x**3) does not simplify to x. + + >>> cbrt(x**3) + (x**3)**(1/3) + + This is because the two are not equal to each other in general. + For example, consider `x == -1`: + + >>> from sympy import Eq + >>> Eq(cbrt(x**3), x).subs(x, -1) + False + + This is because cbrt computes the principal cube root, this + identity does hold if `x` is positive: + + >>> y = Symbol('y', positive=True) + >>> cbrt(y**3) + y + + See Also + ======== + + sympy.polys.rootoftools.rootof, root, real_root + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Cube_root + .. [2] https://en.wikipedia.org/wiki/Principal_value + + """ + return Pow(arg, Rational(1, 3), evaluate=evaluate) + + +def root(arg, n, k=0, evaluate=None): + r"""Returns the *k*-th *n*-th root of ``arg``. + + Parameters + ========== + + k : int, optional + Should be an integer in $\{0, 1, ..., n-1\}$. + Defaults to the principal root if $0$. + + evaluate : bool, optional + The parameter determines if the expression should be evaluated. + If ``None``, its value is taken from + ``global_parameters.evaluate``. + + Examples + ======== + + >>> from sympy import root, Rational + >>> from sympy.abc import x, n + + >>> root(x, 2) + sqrt(x) + + >>> root(x, 3) + x**(1/3) + + >>> root(x, n) + x**(1/n) + + >>> root(x, -Rational(2, 3)) + x**(-3/2) + + To get the k-th n-th root, specify k: + + >>> root(-2, 3, 2) + -(-1)**(2/3)*2**(1/3) + + To get all n n-th roots you can use the rootof function. + The following examples show the roots of unity for n + equal 2, 3 and 4: + + >>> from sympy import rootof + + >>> [rootof(x**2 - 1, i) for i in range(2)] + [-1, 1] + + >>> [rootof(x**3 - 1,i) for i in range(3)] + [1, -1/2 - sqrt(3)*I/2, -1/2 + sqrt(3)*I/2] + + >>> [rootof(x**4 - 1,i) for i in range(4)] + [-1, 1, -I, I] + + SymPy, like other symbolic algebra systems, returns the + complex root of negative numbers. This is the principal + root and differs from the text-book result that one might + be expecting. For example, the cube root of -8 does not + come back as -2: + + >>> root(-8, 3) + 2*(-1)**(1/3) + + The real_root function can be used to either make the principal + result real (or simply to return the real root directly): + + >>> from sympy import real_root + >>> real_root(_) + -2 + >>> real_root(-32, 5) + -2 + + Alternatively, the n//2-th n-th root of a negative number can be + computed with root: + + >>> root(-32, 5, 5//2) + -2 + + See Also + ======== + + sympy.polys.rootoftools.rootof + sympy.core.intfunc.integer_nthroot + sqrt, real_root + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Square_root + .. [2] https://en.wikipedia.org/wiki/Real_root + .. [3] https://en.wikipedia.org/wiki/Root_of_unity + .. [4] https://en.wikipedia.org/wiki/Principal_value + .. [5] https://mathworld.wolfram.com/CubeRoot.html + + """ + n = sympify(n) + if k: + return Mul(Pow(arg, S.One/n, evaluate=evaluate), S.NegativeOne**(2*k/n), evaluate=evaluate) + return Pow(arg, 1/n, evaluate=evaluate) + + +def real_root(arg, n=None, evaluate=None): + r"""Return the real *n*'th-root of *arg* if possible. + + Parameters + ========== + + n : int or None, optional + If *n* is ``None``, then all instances of + $(-n)^{1/\text{odd}}$ will be changed to $-n^{1/\text{odd}}$. + This will only create a real root of a principal root. + The presence of other factors may cause the result to not be + real. + + evaluate : bool, optional + The parameter determines if the expression should be evaluated. + If ``None``, its value is taken from + ``global_parameters.evaluate``. + + Examples + ======== + + >>> from sympy import root, real_root + + >>> real_root(-8, 3) + -2 + >>> root(-8, 3) + 2*(-1)**(1/3) + >>> real_root(_) + -2 + + If one creates a non-principal root and applies real_root, the + result will not be real (so use with caution): + + >>> root(-8, 3, 2) + -2*(-1)**(2/3) + >>> real_root(_) + -2*(-1)**(2/3) + + See Also + ======== + + sympy.polys.rootoftools.rootof + sympy.core.intfunc.integer_nthroot + root, sqrt + """ + from sympy.functions.elementary.complexes import Abs, im, sign + from sympy.functions.elementary.piecewise import Piecewise + if n is not None: + return Piecewise( + (root(arg, n, evaluate=evaluate), Or(Eq(n, S.One), Eq(n, S.NegativeOne))), + (Mul(sign(arg), root(Abs(arg), n, evaluate=evaluate), evaluate=evaluate), + And(Eq(im(arg), S.Zero), Eq(Mod(n, 2), S.One))), + (root(arg, n, evaluate=evaluate), True)) + rv = sympify(arg) + n1pow = Transform(lambda x: -(-x.base)**x.exp, + lambda x: + x.is_Pow and + x.base.is_negative and + x.exp.is_Rational and + x.exp.p == 1 and x.exp.q % 2) + return rv.xreplace(n1pow) + +############################################################################### +############################# MINIMUM and MAXIMUM ############################# +############################################################################### + + +class MinMaxBase(Expr, LatticeOp): + def __new__(cls, *args, **assumptions): + from sympy.core.parameters import global_parameters + evaluate = assumptions.pop('evaluate', global_parameters.evaluate) + args = (sympify(arg) for arg in args) + + # first standard filter, for cls.zero and cls.identity + # also reshape Max(a, Max(b, c)) to Max(a, b, c) + + if evaluate: + try: + args = frozenset(cls._new_args_filter(args)) + except ShortCircuit: + return cls.zero + # remove redundant args that are easily identified + args = cls._collapse_arguments(args, **assumptions) + # find local zeros + args = cls._find_localzeros(args, **assumptions) + args = frozenset(args) + + if not args: + return cls.identity + + if len(args) == 1: + return list(args).pop() + + # base creation + obj = Expr.__new__(cls, *ordered(args), **assumptions) + obj._argset = args + return obj + + @classmethod + def _collapse_arguments(cls, args, **assumptions): + """Remove redundant args. + + Examples + ======== + + >>> from sympy import Min, Max + >>> from sympy.abc import a, b, c, d, e + + Any arg in parent that appears in any + parent-like function in any of the flat args + of parent can be removed from that sub-arg: + + >>> Min(a, Max(b, Min(a, c, d))) + Min(a, Max(b, Min(c, d))) + + If the arg of parent appears in an opposite-than parent + function in any of the flat args of parent that function + can be replaced with the arg: + + >>> Min(a, Max(b, Min(c, d, Max(a, e)))) + Min(a, Max(b, Min(a, c, d))) + """ + if not args: + return args + args = list(ordered(args)) + if cls == Min: + other = Max + else: + other = Min + + # find global comparable max of Max and min of Min if a new + # value is being introduced in these args at position 0 of + # the ordered args + if args[0].is_number: + sifted = mins, maxs = [], [] + for i in args: + for v in walk(i, Min, Max): + if v.args[0].is_comparable: + sifted[isinstance(v, Max)].append(v) + small = Min.identity + for i in mins: + v = i.args[0] + if v.is_number and (v < small) == True: + small = v + big = Max.identity + for i in maxs: + v = i.args[0] + if v.is_number and (v > big) == True: + big = v + # at the point when this function is called from __new__, + # there may be more than one numeric arg present since + # local zeros have not been handled yet, so look through + # more than the first arg + if cls == Min: + for arg in args: + if not arg.is_number: + break + if (arg < small) == True: + small = arg + elif cls == Max: + for arg in args: + if not arg.is_number: + break + if (arg > big) == True: + big = arg + T = None + if cls == Min: + if small != Min.identity: + other = Max + T = small + elif big != Max.identity: + other = Min + T = big + if T is not None: + # remove numerical redundancy + for i in range(len(args)): + a = args[i] + if isinstance(a, other): + a0 = a.args[0] + if ((a0 > T) if other == Max else (a0 < T)) == True: + args[i] = cls.identity + + # remove redundant symbolic args + def do(ai, a): + if not isinstance(ai, (Min, Max)): + return ai + cond = a in ai.args + if not cond: + return ai.func(*[do(i, a) for i in ai.args], + evaluate=False) + if isinstance(ai, cls): + return ai.func(*[do(i, a) for i in ai.args if i != a], + evaluate=False) + return a + for i, a in enumerate(args): + args[i + 1:] = [do(ai, a) for ai in args[i + 1:]] + + # factor out common elements as for + # Min(Max(x, y), Max(x, z)) -> Max(x, Min(y, z)) + # and vice versa when swapping Min/Max -- do this only for the + # easy case where all functions contain something in common; + # trying to find some optimal subset of args to modify takes + # too long + + def factor_minmax(args): + is_other = lambda arg: isinstance(arg, other) + other_args, remaining_args = sift(args, is_other, binary=True) + if not other_args: + return args + + # Min(Max(x, y, z), Max(x, y, u, v)) -> {x,y}, ({z}, {u,v}) + arg_sets = [set(arg.args) for arg in other_args] + common = set.intersection(*arg_sets) + if not common: + return args + + new_other_args = list(common) + arg_sets_diff = [arg_set - common for arg_set in arg_sets] + + # If any set is empty after removing common then all can be + # discarded e.g. Min(Max(a, b, c), Max(a, b)) -> Max(a, b) + if all(arg_sets_diff): + other_args_diff = [other(*s, evaluate=False) for s in arg_sets_diff] + new_other_args.append(cls(*other_args_diff, evaluate=False)) + + other_args_factored = other(*new_other_args, evaluate=False) + return remaining_args + [other_args_factored] + + if len(args) > 1: + args = factor_minmax(args) + + return args + + @classmethod + def _new_args_filter(cls, arg_sequence): + """ + Generator filtering args. + + first standard filter, for cls.zero and cls.identity. + Also reshape ``Max(a, Max(b, c))`` to ``Max(a, b, c)``, + and check arguments for comparability + """ + for arg in arg_sequence: + # pre-filter, checking comparability of arguments + if not isinstance(arg, Expr) or arg.is_extended_real is False or ( + arg.is_number and + not arg.is_comparable): + raise ValueError("The argument '%s' is not comparable." % arg) + + if arg == cls.zero: + raise ShortCircuit(arg) + elif arg == cls.identity: + continue + elif arg.func == cls: + yield from arg.args + else: + yield arg + + @classmethod + def _find_localzeros(cls, values, **options): + """ + Sequentially allocate values to localzeros. + + When a value is identified as being more extreme than another member it + replaces that member; if this is never true, then the value is simply + appended to the localzeros. + """ + localzeros = set() + for v in values: + is_newzero = True + localzeros_ = list(localzeros) + for z in localzeros_: + if id(v) == id(z): + is_newzero = False + else: + con = cls._is_connected(v, z) + if con: + is_newzero = False + if con is True or con == cls: + localzeros.remove(z) + localzeros.update([v]) + if is_newzero: + localzeros.update([v]) + return localzeros + + @classmethod + def _is_connected(cls, x, y): + """ + Check if x and y are connected somehow. + """ + for i in range(2): + if x == y: + return True + t, f = Max, Min + for op in "><": + for j in range(2): + try: + if op == ">": + v = x >= y + else: + v = x <= y + except TypeError: + return False # non-real arg + if not v.is_Relational: + return t if v else f + t, f = f, t + x, y = y, x + x, y = y, x # run next pass with reversed order relative to start + # simplification can be expensive, so be conservative + # in what is attempted + x = factor_terms(x - y) + y = S.Zero + + return False + + def _eval_derivative(self, s): + # f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s) + i = 0 + l = [] + for a in self.args: + i += 1 + da = a.diff(s) + if da.is_zero: + continue + try: + df = self.fdiff(i) + except ArgumentIndexError: + df = super().fdiff(i) + l.append(df * da) + return Add(*l) + + def _eval_rewrite_as_Abs(self, *args, **kwargs): + from sympy.functions.elementary.complexes import Abs + s = (args[0] + self.func(*args[1:]))/2 + d = abs(args[0] - self.func(*args[1:]))/2 + return (s + d if isinstance(self, Max) else s - d).rewrite(Abs) + + def evalf(self, n=15, **options): + return self.func(*[a.evalf(n, **options) for a in self.args]) + + def n(self, *args, **kwargs): + return self.evalf(*args, **kwargs) + + _eval_is_algebraic = lambda s: _torf(i.is_algebraic for i in s.args) + _eval_is_antihermitian = lambda s: _torf(i.is_antihermitian for i in s.args) + _eval_is_commutative = lambda s: _torf(i.is_commutative for i in s.args) + _eval_is_complex = lambda s: _torf(i.is_complex for i in s.args) + _eval_is_composite = lambda s: _torf(i.is_composite for i in s.args) + _eval_is_even = lambda s: _torf(i.is_even for i in s.args) + _eval_is_finite = lambda s: _torf(i.is_finite for i in s.args) + _eval_is_hermitian = lambda s: _torf(i.is_hermitian for i in s.args) + _eval_is_imaginary = lambda s: _torf(i.is_imaginary for i in s.args) + _eval_is_infinite = lambda s: _torf(i.is_infinite for i in s.args) + _eval_is_integer = lambda s: _torf(i.is_integer for i in s.args) + _eval_is_irrational = lambda s: _torf(i.is_irrational for i in s.args) + _eval_is_negative = lambda s: _torf(i.is_negative for i in s.args) + _eval_is_noninteger = lambda s: _torf(i.is_noninteger for i in s.args) + _eval_is_nonnegative = lambda s: _torf(i.is_nonnegative for i in s.args) + _eval_is_nonpositive = lambda s: _torf(i.is_nonpositive for i in s.args) + _eval_is_nonzero = lambda s: _torf(i.is_nonzero for i in s.args) + _eval_is_odd = lambda s: _torf(i.is_odd for i in s.args) + _eval_is_polar = lambda s: _torf(i.is_polar for i in s.args) + _eval_is_positive = lambda s: _torf(i.is_positive for i in s.args) + _eval_is_prime = lambda s: _torf(i.is_prime for i in s.args) + _eval_is_rational = lambda s: _torf(i.is_rational for i in s.args) + _eval_is_real = lambda s: _torf(i.is_real for i in s.args) + _eval_is_extended_real = lambda s: _torf(i.is_extended_real for i in s.args) + _eval_is_transcendental = lambda s: _torf(i.is_transcendental for i in s.args) + _eval_is_zero = lambda s: _torf(i.is_zero for i in s.args) + + +class Max(MinMaxBase, Application): + r""" + Return, if possible, the maximum value of the list. + + When number of arguments is equal one, then + return this argument. + + When number of arguments is equal two, then + return, if possible, the value from (a, b) that is $\ge$ the other. + + In common case, when the length of list greater than 2, the task + is more complicated. Return only the arguments, which are greater + than others, if it is possible to determine directional relation. + + If is not possible to determine such a relation, return a partially + evaluated result. + + Assumptions are used to make the decision too. + + Also, only comparable arguments are permitted. + + It is named ``Max`` and not ``max`` to avoid conflicts + with the built-in function ``max``. + + + Examples + ======== + + >>> from sympy import Max, Symbol, oo + >>> from sympy.abc import x, y, z + >>> p = Symbol('p', positive=True) + >>> n = Symbol('n', negative=True) + + >>> Max(x, -2) + Max(-2, x) + >>> Max(x, -2).subs(x, 3) + 3 + >>> Max(p, -2) + p + >>> Max(x, y) + Max(x, y) + >>> Max(x, y) == Max(y, x) + True + >>> Max(x, Max(y, z)) + Max(x, y, z) + >>> Max(n, 8, p, 7, -oo) + Max(8, p) + >>> Max (1, x, oo) + oo + + * Algorithm + + The task can be considered as searching of supremums in the + directed complete partial orders [1]_. + + The source values are sequentially allocated by the isolated subsets + in which supremums are searched and result as Max arguments. + + If the resulted supremum is single, then it is returned. + + The isolated subsets are the sets of values which are only the comparable + with each other in the current set. E.g. natural numbers are comparable with + each other, but not comparable with the `x` symbol. Another example: the + symbol `x` with negative assumption is comparable with a natural number. + + Also there are "least" elements, which are comparable with all others, + and have a zero property (maximum or minimum for all elements). + For example, in case of $\infty$, the allocation operation is terminated + and only this value is returned. + + Assumption: + - if $A > B > C$ then $A > C$ + - if $A = B$ then $B$ can be removed + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Directed_complete_partial_order + .. [2] https://en.wikipedia.org/wiki/Lattice_%28order%29 + + See Also + ======== + + Min : find minimum values + """ + zero = S.Infinity + identity = S.NegativeInfinity + + def fdiff( self, argindex ): + from sympy.functions.special.delta_functions import Heaviside + n = len(self.args) + if 0 < argindex and argindex <= n: + argindex -= 1 + if n == 2: + return Heaviside(self.args[argindex] - self.args[1 - argindex]) + newargs = tuple([self.args[i] for i in range(n) if i != argindex]) + return Heaviside(self.args[argindex] - Max(*newargs)) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Heaviside(self, *args, **kwargs): + from sympy.functions.special.delta_functions import Heaviside + return Add(*[j*Mul(*[Heaviside(j - i) for i in args if i!=j]) \ + for j in args]) + + def _eval_rewrite_as_Piecewise(self, *args, **kwargs): + return _minmax_as_Piecewise('>=', *args) + + def _eval_is_positive(self): + return fuzzy_or(a.is_positive for a in self.args) + + def _eval_is_nonnegative(self): + return fuzzy_or(a.is_nonnegative for a in self.args) + + def _eval_is_negative(self): + return fuzzy_and(a.is_negative for a in self.args) + + +class Min(MinMaxBase, Application): + """ + Return, if possible, the minimum value of the list. + It is named ``Min`` and not ``min`` to avoid conflicts + with the built-in function ``min``. + + Examples + ======== + + >>> from sympy import Min, Symbol, oo + >>> from sympy.abc import x, y + >>> p = Symbol('p', positive=True) + >>> n = Symbol('n', negative=True) + + >>> Min(x, -2) + Min(-2, x) + >>> Min(x, -2).subs(x, 3) + -2 + >>> Min(p, -3) + -3 + >>> Min(x, y) + Min(x, y) + >>> Min(n, 8, p, -7, p, oo) + Min(-7, n) + + See Also + ======== + + Max : find maximum values + """ + zero = S.NegativeInfinity + identity = S.Infinity + + def fdiff( self, argindex ): + from sympy.functions.special.delta_functions import Heaviside + n = len(self.args) + if 0 < argindex and argindex <= n: + argindex -= 1 + if n == 2: + return Heaviside( self.args[1-argindex] - self.args[argindex] ) + newargs = tuple([ self.args[i] for i in range(n) if i != argindex]) + return Heaviside( Min(*newargs) - self.args[argindex] ) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Heaviside(self, *args, **kwargs): + from sympy.functions.special.delta_functions import Heaviside + return Add(*[j*Mul(*[Heaviside(i-j) for i in args if i!=j]) \ + for j in args]) + + def _eval_rewrite_as_Piecewise(self, *args, **kwargs): + return _minmax_as_Piecewise('<=', *args) + + def _eval_is_positive(self): + return fuzzy_and(a.is_positive for a in self.args) + + def _eval_is_nonnegative(self): + return fuzzy_and(a.is_nonnegative for a in self.args) + + def _eval_is_negative(self): + return fuzzy_or(a.is_negative for a in self.args) + + +class Rem(DefinedFunction): + """Returns the remainder when ``p`` is divided by ``q`` where ``p`` is finite + and ``q`` is not equal to zero. The result, ``p - int(p/q)*q``, has the same sign + as the divisor. + + Parameters + ========== + + p : Expr + Dividend. + + q : Expr + Divisor. + + Notes + ===== + + ``Rem`` corresponds to the ``%`` operator in C. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import Rem + >>> Rem(x**3, y) + Rem(x**3, y) + >>> Rem(x**3, y).subs({x: -5, y: 3}) + -2 + + See Also + ======== + + Mod + """ + kind = NumberKind + + @classmethod + def eval(cls, p, q): + """Return the function remainder if both p, q are numbers and q is not + zero. + """ + + if q.is_zero: + raise ZeroDivisionError("Division by zero") + if p is S.NaN or q is S.NaN or p.is_finite is False or q.is_finite is False: + return S.NaN + if p is S.Zero or p in (q, -q) or (p.is_integer and q == 1): + return S.Zero + + if q.is_Number: + if p.is_Number: + return p - Integer(p/q)*q diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/piecewise.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/piecewise.py new file mode 100644 index 0000000000000000000000000000000000000000..fe4a4d4f57e2c3af170dac994e11782b9ed54b8f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/piecewise.py @@ -0,0 +1,1517 @@ +from sympy.core import S, diff, Tuple, Dummy, Mul +from sympy.core.basic import Basic, as_Basic +from sympy.core.function import DefinedFunction +from sympy.core.numbers import Rational, NumberSymbol, _illegal +from sympy.core.parameters import global_parameters +from sympy.core.relational import (Lt, Gt, Eq, Ne, Relational, + _canonical, _canonical_coeff) +from sympy.core.sorting import ordered +from sympy.functions.elementary.miscellaneous import Max, Min +from sympy.logic.boolalg import (And, Boolean, distribute_and_over_or, Not, + true, false, Or, ITE, simplify_logic, to_cnf, distribute_or_over_and) +from sympy.utilities.iterables import uniq, sift, common_prefix +from sympy.utilities.misc import filldedent, func_name + +from itertools import product + +Undefined = S.NaN # Piecewise() + +class ExprCondPair(Tuple): + """Represents an expression, condition pair.""" + + def __new__(cls, expr, cond): + expr = as_Basic(expr) + if cond == True: + return Tuple.__new__(cls, expr, true) + elif cond == False: + return Tuple.__new__(cls, expr, false) + elif isinstance(cond, Basic) and cond.has(Piecewise): + cond = piecewise_fold(cond) + if isinstance(cond, Piecewise): + cond = cond.rewrite(ITE) + + if not isinstance(cond, Boolean): + raise TypeError(filldedent(''' + Second argument must be a Boolean, + not `%s`''' % func_name(cond))) + return Tuple.__new__(cls, expr, cond) + + @property + def expr(self): + """ + Returns the expression of this pair. + """ + return self.args[0] + + @property + def cond(self): + """ + Returns the condition of this pair. + """ + return self.args[1] + + @property + def is_commutative(self): + return self.expr.is_commutative + + def __iter__(self): + yield self.expr + yield self.cond + + def _eval_simplify(self, **kwargs): + return self.func(*[a.simplify(**kwargs) for a in self.args]) + + +class Piecewise(DefinedFunction): + """ + Represents a piecewise function. + + Usage: + + Piecewise( (expr,cond), (expr,cond), ... ) + - Each argument is a 2-tuple defining an expression and condition + - The conds are evaluated in turn returning the first that is True. + If any of the evaluated conds are not explicitly False, + e.g. ``x < 1``, the function is returned in symbolic form. + - If the function is evaluated at a place where all conditions are False, + nan will be returned. + - Pairs where the cond is explicitly False, will be removed and no pair + appearing after a True condition will ever be retained. If a single + pair with a True condition remains, it will be returned, even when + evaluation is False. + + Examples + ======== + + >>> from sympy import Piecewise, log, piecewise_fold + >>> from sympy.abc import x, y + >>> f = x**2 + >>> g = log(x) + >>> p = Piecewise((0, x < -1), (f, x <= 1), (g, True)) + >>> p.subs(x,1) + 1 + >>> p.subs(x,5) + log(5) + + Booleans can contain Piecewise elements: + + >>> cond = (x < y).subs(x, Piecewise((2, x < 0), (3, True))); cond + Piecewise((2, x < 0), (3, True)) < y + + The folded version of this results in a Piecewise whose + expressions are Booleans: + + >>> folded_cond = piecewise_fold(cond); folded_cond + Piecewise((2 < y, x < 0), (3 < y, True)) + + When a Boolean containing Piecewise (like cond) or a Piecewise + with Boolean expressions (like folded_cond) is used as a condition, + it is converted to an equivalent :class:`~.ITE` object: + + >>> Piecewise((1, folded_cond)) + Piecewise((1, ITE(x < 0, y > 2, y > 3))) + + When a condition is an ``ITE``, it will be converted to a simplified + Boolean expression: + + >>> piecewise_fold(_) + Piecewise((1, ((x >= 0) | (y > 2)) & ((y > 3) | (x < 0)))) + + See Also + ======== + + piecewise_fold + piecewise_exclusive + ITE + """ + + nargs = None + is_Piecewise = True + + def __new__(cls, *args, **options): + if len(args) == 0: + raise TypeError("At least one (expr, cond) pair expected.") + # (Try to) sympify args first + newargs = [] + for ec in args: + # ec could be a ExprCondPair or a tuple + pair = ExprCondPair(*getattr(ec, 'args', ec)) + cond = pair.cond + if cond is false: + continue + newargs.append(pair) + if cond is true: + break + + eval = options.pop('evaluate', global_parameters.evaluate) + if eval: + r = cls.eval(*newargs) + if r is not None: + return r + elif len(newargs) == 1 and newargs[0].cond == True: + return newargs[0].expr + + return Basic.__new__(cls, *newargs, **options) + + @classmethod + def eval(cls, *_args): + """Either return a modified version of the args or, if no + modifications were made, return None. + + Modifications that are made here: + + 1. relationals are made canonical + 2. any False conditions are dropped + 3. any repeat of a previous condition is ignored + 4. any args past one with a true condition are dropped + + If there are no args left, nan will be returned. + If there is a single arg with a True condition, its + corresponding expression will be returned. + + EXAMPLES + ======== + + >>> from sympy import Piecewise + >>> from sympy.abc import x + >>> cond = -x < -1 + >>> args = [(1, cond), (4, cond), (3, False), (2, True), (5, x < 1)] + >>> Piecewise(*args, evaluate=False) + Piecewise((1, -x < -1), (4, -x < -1), (2, True)) + >>> Piecewise(*args) + Piecewise((1, x > 1), (2, True)) + """ + if not _args: + return Undefined + + if len(_args) == 1 and _args[0][-1] == True: + return _args[0][0] + + newargs = _piecewise_collapse_arguments(_args) + + # some conditions may have been redundant + missing = len(newargs) != len(_args) + # some conditions may have changed + same = all(a == b for a, b in zip(newargs, _args)) + # if either change happened we return the expr with the + # updated args + if not newargs: + raise ValueError(filldedent(''' + There are no conditions (or none that + are not trivially false) to define an + expression.''')) + if missing or not same: + return cls(*newargs) + + def doit(self, **hints): + """ + Evaluate this piecewise function. + """ + newargs = [] + for e, c in self.args: + if hints.get('deep', True): + if isinstance(e, Basic): + newe = e.doit(**hints) + if newe != self: + e = newe + if isinstance(c, Basic): + c = c.doit(**hints) + newargs.append((e, c)) + return self.func(*newargs) + + def _eval_simplify(self, **kwargs): + return piecewise_simplify(self, **kwargs) + + def _eval_as_leading_term(self, x, logx, cdir): + for e, c in self.args: + if c == True or c.subs(x, 0) == True: + return e.as_leading_term(x) + + def _eval_adjoint(self): + return self.func(*[(e.adjoint(), c) for e, c in self.args]) + + def _eval_conjugate(self): + return self.func(*[(e.conjugate(), c) for e, c in self.args]) + + def _eval_derivative(self, x): + return self.func(*[(diff(e, x), c) for e, c in self.args]) + + def _eval_evalf(self, prec): + return self.func(*[(e._evalf(prec), c) for e, c in self.args]) + + def _eval_is_meromorphic(self, x, a): + # Conditions often implicitly assume that the argument is real. + # Hence, there needs to be some check for as_set. + if not a.is_real: + return None + + # Then, scan ExprCondPairs in the given order to find a piece that would contain a, + # possibly as a boundary point. + for e, c in self.args: + cond = c.subs(x, a) + + if cond.is_Relational: + return None + if a in c.as_set().boundary: + return None + # Apply expression if a is an interior point of the domain of e. + if cond: + return e._eval_is_meromorphic(x, a) + + def piecewise_integrate(self, x, **kwargs): + """Return the Piecewise with each expression being + replaced with its antiderivative. To obtain a continuous + antiderivative, use the :func:`~.integrate` function or method. + + Examples + ======== + + >>> from sympy import Piecewise + >>> from sympy.abc import x + >>> p = Piecewise((0, x < 0), (1, x < 1), (2, True)) + >>> p.piecewise_integrate(x) + Piecewise((0, x < 0), (x, x < 1), (2*x, True)) + + Note that this does not give a continuous function, e.g. + at x = 1 the 3rd condition applies and the antiderivative + there is 2*x so the value of the antiderivative is 2: + + >>> anti = _ + >>> anti.subs(x, 1) + 2 + + The continuous derivative accounts for the integral *up to* + the point of interest, however: + + >>> p.integrate(x) + Piecewise((0, x < 0), (x, x < 1), (2*x - 1, True)) + >>> _.subs(x, 1) + 1 + + See Also + ======== + Piecewise._eval_integral + """ + from sympy.integrals import integrate + return self.func(*[(integrate(e, x, **kwargs), c) for e, c in self.args]) + + def _handle_irel(self, x, handler): + """Return either None (if the conditions of self depend only on x) else + a Piecewise expression whose expressions (handled by the handler that + was passed) are paired with the governing x-independent relationals, + e.g. Piecewise((A, a(x) & b(y)), (B, c(x) | c(y)) -> + Piecewise( + (handler(Piecewise((A, a(x) & True), (B, c(x) | True)), b(y) & c(y)), + (handler(Piecewise((A, a(x) & True), (B, c(x) | False)), b(y)), + (handler(Piecewise((A, a(x) & False), (B, c(x) | True)), c(y)), + (handler(Piecewise((A, a(x) & False), (B, c(x) | False)), True)) + """ + # identify governing relationals + rel = self.atoms(Relational) + irel = list(ordered([r for r in rel if x not in r.free_symbols + and r not in (S.true, S.false)])) + if irel: + args = {} + exprinorder = [] + for truth in product((1, 0), repeat=len(irel)): + reps = dict(zip(irel, truth)) + # only store the true conditions since the false are implied + # when they appear lower in the Piecewise args + if 1 not in truth: + cond = None # flag this one so it doesn't get combined + else: + andargs = Tuple(*[i for i in reps if reps[i]]) + free = list(andargs.free_symbols) + if len(free) == 1: + from sympy.solvers.inequalities import ( + reduce_inequalities, _solve_inequality) + try: + t = reduce_inequalities(andargs, free[0]) + # ValueError when there are potentially + # nonvanishing imaginary parts + except (ValueError, NotImplementedError): + # at least isolate free symbol on left + t = And(*[_solve_inequality( + a, free[0], linear=True) + for a in andargs]) + else: + t = And(*andargs) + if t is S.false: + continue # an impossible combination + cond = t + expr = handler(self.xreplace(reps)) + if isinstance(expr, self.func) and len(expr.args) == 1: + expr, econd = expr.args[0] + cond = And(econd, True if cond is None else cond) + # the ec pairs are being collected since all possibilities + # are being enumerated, but don't put the last one in since + # its expr might match a previous expression and it + # must appear last in the args + if cond is not None: + args.setdefault(expr, []).append(cond) + # but since we only store the true conditions we must maintain + # the order so that the expression with the most true values + # comes first + exprinorder.append(expr) + # convert collected conditions as args of Or + for k in args: + args[k] = Or(*args[k]) + # take them in the order obtained + args = [(e, args[e]) for e in uniq(exprinorder)] + # add in the last arg + args.append((expr, True)) + return Piecewise(*args) + + def _eval_integral(self, x, _first=True, **kwargs): + """Return the indefinite integral of the + Piecewise such that subsequent substitution of x with a + value will give the value of the integral (not including + the constant of integration) up to that point. To only + integrate the individual parts of Piecewise, use the + ``piecewise_integrate`` method. + + Examples + ======== + + >>> from sympy import Piecewise + >>> from sympy.abc import x + >>> p = Piecewise((0, x < 0), (1, x < 1), (2, True)) + >>> p.integrate(x) + Piecewise((0, x < 0), (x, x < 1), (2*x - 1, True)) + >>> p.piecewise_integrate(x) + Piecewise((0, x < 0), (x, x < 1), (2*x, True)) + + See Also + ======== + Piecewise.piecewise_integrate + """ + from sympy.integrals.integrals import integrate + + if _first: + def handler(ipw): + if isinstance(ipw, self.func): + return ipw._eval_integral(x, _first=False, **kwargs) + else: + return ipw.integrate(x, **kwargs) + irv = self._handle_irel(x, handler) + if irv is not None: + return irv + + # handle a Piecewise from -oo to oo with and no x-independent relationals + # ----------------------------------------------------------------------- + ok, abei = self._intervals(x) + if not ok: + from sympy.integrals.integrals import Integral + return Integral(self, x) # unevaluated + + pieces = [(a, b) for a, b, _, _ in abei] + oo = S.Infinity + done = [(-oo, oo, -1)] + for k, p in enumerate(pieces): + if p == (-oo, oo): + # all undone intervals will get this key + for j, (a, b, i) in enumerate(done): + if i == -1: + done[j] = a, b, k + break # nothing else to consider + N = len(done) - 1 + for j, (a, b, i) in enumerate(reversed(done)): + if i == -1: + j = N - j + done[j: j + 1] = _clip(p, (a, b), k) + done = [(a, b, i) for a, b, i in done if a != b] + + # append an arg if there is a hole so a reference to + # argument -1 will give Undefined + if any(i == -1 for (a, b, i) in done): + abei.append((-oo, oo, Undefined, -1)) + + # return the sum of the intervals + args = [] + sum = None + for a, b, i in done: + anti = integrate(abei[i][-2], x, **kwargs) + if sum is None: + sum = anti + else: + sum = sum.subs(x, a) + e = anti._eval_interval(x, a, x) + if sum.has(*_illegal) or e.has(*_illegal): + sum = anti + else: + sum += e + # see if we know whether b is contained in original + # condition + if b is S.Infinity: + cond = True + elif self.args[abei[i][-1]].cond.subs(x, b) == False: + cond = (x < b) + else: + cond = (x <= b) + args.append((sum, cond)) + return Piecewise(*args) + + def _eval_interval(self, sym, a, b, _first=True): + """Evaluates the function along the sym in a given interval [a, b]""" + # FIXME: Currently complex intervals are not supported. A possible + # replacement algorithm, discussed in issue 5227, can be found in the + # following papers; + # http://portal.acm.org/citation.cfm?id=281649 + # http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.70.4127&rep=rep1&type=pdf + + if a is None or b is None: + # In this case, it is just simple substitution + return super()._eval_interval(sym, a, b) + else: + x, lo, hi = map(as_Basic, (sym, a, b)) + + if _first: # get only x-dependent relationals + def handler(ipw): + if isinstance(ipw, self.func): + return ipw._eval_interval(x, lo, hi, _first=None) + else: + return ipw._eval_interval(x, lo, hi) + irv = self._handle_irel(x, handler) + if irv is not None: + return irv + + if (lo < hi) is S.false or ( + lo is S.Infinity or hi is S.NegativeInfinity): + rv = self._eval_interval(x, hi, lo, _first=False) + if isinstance(rv, Piecewise): + rv = Piecewise(*[(-e, c) for e, c in rv.args]) + else: + rv = -rv + return rv + + if (lo < hi) is S.true or ( + hi is S.Infinity or lo is S.NegativeInfinity): + pass + else: + _a = Dummy('lo') + _b = Dummy('hi') + a = lo if lo.is_comparable else _a + b = hi if hi.is_comparable else _b + pos = self._eval_interval(x, a, b, _first=False) + if a == _a and b == _b: + # it's purely symbolic so just swap lo and hi and + # change the sign to get the value for when lo > hi + neg, pos = (-pos.xreplace({_a: hi, _b: lo}), + pos.xreplace({_a: lo, _b: hi})) + else: + # at least one of the bounds was comparable, so allow + # _eval_interval to use that information when computing + # the interval with lo and hi reversed + neg, pos = (-self._eval_interval(x, hi, lo, _first=False), + pos.xreplace({_a: lo, _b: hi})) + + # allow simplification based on ordering of lo and hi + p = Dummy('', positive=True) + if lo.is_Symbol: + pos = pos.xreplace({lo: hi - p}).xreplace({p: hi - lo}) + neg = neg.xreplace({lo: hi + p}).xreplace({p: lo - hi}) + elif hi.is_Symbol: + pos = pos.xreplace({hi: lo + p}).xreplace({p: hi - lo}) + neg = neg.xreplace({hi: lo - p}).xreplace({p: lo - hi}) + # evaluate limits that may have unevaluate Min/Max + touch = lambda _: _.replace( + lambda x: isinstance(x, (Min, Max)), + lambda x: x.func(*x.args)) + neg = touch(neg) + pos = touch(pos) + # assemble return expression; make the first condition be Lt + # b/c then the first expression will look the same whether + # the lo or hi limit is symbolic + if a == _a: # the lower limit was symbolic + rv = Piecewise( + (pos, + lo < hi), + (neg, + True)) + else: + rv = Piecewise( + (neg, + hi < lo), + (pos, + True)) + + if rv == Undefined: + raise ValueError("Can't integrate across undefined region.") + if any(isinstance(i, Piecewise) for i in (pos, neg)): + rv = piecewise_fold(rv) + return rv + + # handle a Piecewise with lo <= hi and no x-independent relationals + # ----------------------------------------------------------------- + ok, abei = self._intervals(x) + if not ok: + from sympy.integrals.integrals import Integral + # not being able to do the interval of f(x) can + # be stated as not being able to do the integral + # of f'(x) over the same range + return Integral(self.diff(x), (x, lo, hi)) # unevaluated + + pieces = [(a, b) for a, b, _, _ in abei] + done = [(lo, hi, -1)] + oo = S.Infinity + for k, p in enumerate(pieces): + if p[:2] == (-oo, oo): + # all undone intervals will get this key + for j, (a, b, i) in enumerate(done): + if i == -1: + done[j] = a, b, k + break # nothing else to consider + N = len(done) - 1 + for j, (a, b, i) in enumerate(reversed(done)): + if i == -1: + j = N - j + done[j: j + 1] = _clip(p, (a, b), k) + done = [(a, b, i) for a, b, i in done if a != b] + + # return the sum of the intervals + sum = S.Zero + upto = None + for a, b, i in done: + if i == -1: + if upto is None: + return Undefined + # TODO simplify hi <= upto + return Piecewise((sum, hi <= upto), (Undefined, True)) + sum += abei[i][-2]._eval_interval(x, a, b) + upto = b + return sum + + def _intervals(self, sym, err_on_Eq=False): + r"""Return a bool and a message (when bool is False), else a + list of unique tuples, (a, b, e, i), where a and b + are the lower and upper bounds in which the expression e of + argument i in self is defined and $a < b$ (when involving + numbers) or $a \le b$ when involving symbols. + + If there are any relationals not involving sym, or any + relational cannot be solved for sym, the bool will be False + a message be given as the second return value. The calling + routine should have removed such relationals before calling + this routine. + + The evaluated conditions will be returned as ranges. + Discontinuous ranges will be returned separately with + identical expressions. The first condition that evaluates to + True will be returned as the last tuple with a, b = -oo, oo. + """ + from sympy.solvers.inequalities import _solve_inequality + + assert isinstance(self, Piecewise) + + def nonsymfail(cond): + return False, filldedent(''' + A condition not involving + %s appeared: %s''' % (sym, cond)) + + def _solve_relational(r): + if sym not in r.free_symbols: + return nonsymfail(r) + try: + rv = _solve_inequality(r, sym) + except NotImplementedError: + return False, 'Unable to solve relational %s for %s.' % (r, sym) + if isinstance(rv, Relational): + free = rv.args[1].free_symbols + if rv.args[0] != sym or sym in free: + return False, 'Unable to solve relational %s for %s.' % (r, sym) + if rv.rel_op == '==': + # this equality has been affirmed to have the form + # Eq(sym, rhs) where rhs is sym-free; it represents + # a zero-width interval which will be ignored + # whether it is an isolated condition or contained + # within an And or an Or + rv = S.false + elif rv.rel_op == '!=': + try: + rv = Or(sym < rv.rhs, sym > rv.rhs) + except TypeError: + # e.g. x != I ==> all real x satisfy + rv = S.true + elif rv == (S.NegativeInfinity < sym) & (sym < S.Infinity): + rv = S.true + return True, rv + + args = list(self.args) + # make self canonical wrt Relationals + keys = self.atoms(Relational) + reps = {} + for r in keys: + ok, s = _solve_relational(r) + if ok != True: + return False, ok + reps[r] = s + # process args individually so if any evaluate, their position + # in the original Piecewise will be known + args = [i.xreplace(reps) for i in self.args] + + # precondition args + expr_cond = [] + default = idefault = None + for i, (expr, cond) in enumerate(args): + if cond is S.false: + continue + if cond is S.true: + default = expr + idefault = i + break + if isinstance(cond, Eq): + # unanticipated condition, but it is here in case a + # replacement caused an Eq to appear + if err_on_Eq: + return False, 'encountered Eq condition: %s' % cond + continue # zero width interval + + cond = to_cnf(cond) + if isinstance(cond, And): + cond = distribute_or_over_and(cond) + + if isinstance(cond, Or): + expr_cond.extend( + [(i, expr, o) for o in cond.args + if not isinstance(o, Eq)]) + elif cond is not S.false: + expr_cond.append((i, expr, cond)) + elif cond is S.true: + default = expr + idefault = i + break + + # determine intervals represented by conditions + int_expr = [] + for iarg, expr, cond in expr_cond: + if isinstance(cond, And): + lower = S.NegativeInfinity + upper = S.Infinity + exclude = [] + for cond2 in cond.args: + if not isinstance(cond2, Relational): + return False, 'expecting only Relationals' + if isinstance(cond2, Eq): + lower = upper # ignore + if err_on_Eq: + return False, 'encountered secondary Eq condition' + break + elif isinstance(cond2, Ne): + l, r = cond2.args + if l == sym: + exclude.append(r) + elif r == sym: + exclude.append(l) + else: + return nonsymfail(cond2) + continue + elif cond2.lts == sym: + upper = Min(cond2.gts, upper) + elif cond2.gts == sym: + lower = Max(cond2.lts, lower) + else: + return nonsymfail(cond2) # should never get here + if exclude: + exclude = list(ordered(exclude)) + newcond = [] + for i, e in enumerate(exclude): + if e < lower == True or e > upper == True: + continue + if not newcond: + newcond.append((None, lower)) # add a primer + newcond.append((newcond[-1][1], e)) + newcond.append((newcond[-1][1], upper)) + newcond.pop(0) # remove the primer + expr_cond.extend([(iarg, expr, And(i[0] < sym, sym < i[1])) for i in newcond]) + continue + elif isinstance(cond, Relational) and cond.rel_op != '!=': + lower, upper = cond.lts, cond.gts # part 1: initialize with givens + if cond.lts == sym: # part 1a: expand the side ... + lower = S.NegativeInfinity # e.g. x <= 0 ---> -oo <= 0 + elif cond.gts == sym: # part 1a: ... that can be expanded + upper = S.Infinity # e.g. x >= 0 ---> oo >= 0 + else: + return nonsymfail(cond) + else: + return False, 'unrecognized condition: %s' % cond + + upper = Max(lower, upper) + if err_on_Eq and lower == upper: + return False, 'encountered Eq condition' + if (lower >= upper) is not S.true: + int_expr.append((lower, upper, expr, iarg)) + + if default is not None: + int_expr.append( + (S.NegativeInfinity, S.Infinity, default, idefault)) + + return True, list(uniq(int_expr)) + + def _eval_nseries(self, x, n, logx, cdir=0): + args = [(ec.expr._eval_nseries(x, n, logx), ec.cond) for ec in self.args] + return self.func(*args) + + def _eval_power(self, s): + return self.func(*[(e**s, c) for e, c in self.args]) + + def _eval_subs(self, old, new): + # this is strictly not necessary, but we can keep track + # of whether True or False conditions arise and be + # somewhat more efficient by avoiding other substitutions + # and avoiding invalid conditions that appear after a + # True condition + args = list(self.args) + args_exist = False + for i, (e, c) in enumerate(args): + c = c._subs(old, new) + if c != False: + args_exist = True + e = e._subs(old, new) + args[i] = (e, c) + if c == True: + break + if not args_exist: + args = ((Undefined, True),) + return self.func(*args) + + def _eval_transpose(self): + return self.func(*[(e.transpose(), c) for e, c in self.args]) + + def _eval_template_is_attr(self, is_attr): + b = None + for expr, _ in self.args: + a = getattr(expr, is_attr) + if a is None: + return + if b is None: + b = a + elif b is not a: + return + return b + + _eval_is_finite = lambda self: self._eval_template_is_attr( + 'is_finite') + _eval_is_complex = lambda self: self._eval_template_is_attr('is_complex') + _eval_is_even = lambda self: self._eval_template_is_attr('is_even') + _eval_is_imaginary = lambda self: self._eval_template_is_attr( + 'is_imaginary') + _eval_is_integer = lambda self: self._eval_template_is_attr('is_integer') + _eval_is_irrational = lambda self: self._eval_template_is_attr( + 'is_irrational') + _eval_is_negative = lambda self: self._eval_template_is_attr('is_negative') + _eval_is_nonnegative = lambda self: self._eval_template_is_attr( + 'is_nonnegative') + _eval_is_nonpositive = lambda self: self._eval_template_is_attr( + 'is_nonpositive') + _eval_is_nonzero = lambda self: self._eval_template_is_attr( + 'is_nonzero') + _eval_is_odd = lambda self: self._eval_template_is_attr('is_odd') + _eval_is_polar = lambda self: self._eval_template_is_attr('is_polar') + _eval_is_positive = lambda self: self._eval_template_is_attr('is_positive') + _eval_is_extended_real = lambda self: self._eval_template_is_attr( + 'is_extended_real') + _eval_is_extended_positive = lambda self: self._eval_template_is_attr( + 'is_extended_positive') + _eval_is_extended_negative = lambda self: self._eval_template_is_attr( + 'is_extended_negative') + _eval_is_extended_nonzero = lambda self: self._eval_template_is_attr( + 'is_extended_nonzero') + _eval_is_extended_nonpositive = lambda self: self._eval_template_is_attr( + 'is_extended_nonpositive') + _eval_is_extended_nonnegative = lambda self: self._eval_template_is_attr( + 'is_extended_nonnegative') + _eval_is_real = lambda self: self._eval_template_is_attr('is_real') + _eval_is_zero = lambda self: self._eval_template_is_attr( + 'is_zero') + + @classmethod + def __eval_cond(cls, cond): + """Return the truth value of the condition.""" + if cond == True: + return True + if isinstance(cond, Eq): + try: + diff = cond.lhs - cond.rhs + if diff.is_commutative: + return diff.is_zero + except TypeError: + pass + + def as_expr_set_pairs(self, domain=None): + """Return tuples for each argument of self that give + the expression and the interval in which it is valid + which is contained within the given domain. + If a condition cannot be converted to a set, an error + will be raised. The variable of the conditions is + assumed to be real; sets of real values are returned. + + Examples + ======== + + >>> from sympy import Piecewise, Interval + >>> from sympy.abc import x + >>> p = Piecewise( + ... (1, x < 2), + ... (2,(x > 0) & (x < 4)), + ... (3, True)) + >>> p.as_expr_set_pairs() + [(1, Interval.open(-oo, 2)), + (2, Interval.Ropen(2, 4)), + (3, Interval(4, oo))] + >>> p.as_expr_set_pairs(Interval(0, 3)) + [(1, Interval.Ropen(0, 2)), + (2, Interval(2, 3))] + """ + if domain is None: + domain = S.Reals + exp_sets = [] + U = domain + complex = not domain.is_subset(S.Reals) + cond_free = set() + for expr, cond in self.args: + cond_free |= cond.free_symbols + if len(cond_free) > 1: + raise NotImplementedError(filldedent(''' + multivariate conditions are not handled.''')) + if complex: + for i in cond.atoms(Relational): + if not isinstance(i, (Eq, Ne)): + raise ValueError(filldedent(''' + Inequalities in the complex domain are + not supported. Try the real domain by + setting domain=S.Reals''')) + cond_int = U.intersect(cond.as_set()) + U = U - cond_int + if cond_int != S.EmptySet: + exp_sets.append((expr, cond_int)) + return exp_sets + + def _eval_rewrite_as_ITE(self, *args, **kwargs): + byfree = {} + args = list(args) + default = any(c == True for b, c in args) + for i, (b, c) in enumerate(args): + if not isinstance(b, Boolean) and b != True: + raise TypeError(filldedent(''' + Expecting Boolean or bool but got `%s` + ''' % func_name(b))) + if c == True: + break + # loop over independent conditions for this b + for c in c.args if isinstance(c, Or) else [c]: + free = c.free_symbols + x = free.pop() + try: + byfree[x] = byfree.setdefault( + x, S.EmptySet).union(c.as_set()) + except NotImplementedError: + if not default: + raise NotImplementedError(filldedent(''' + A method to determine whether a multivariate + conditional is consistent with a complete coverage + of all variables has not been implemented so the + rewrite is being stopped after encountering `%s`. + This error would not occur if a default expression + like `(foo, True)` were given. + ''' % c)) + if byfree[x] in (S.UniversalSet, S.Reals): + # collapse the ith condition to True and break + args[i] = list(args[i]) + c = args[i][1] = True + break + if c == True: + break + if c != True: + raise ValueError(filldedent(''' + Conditions must cover all reals or a final default + condition `(foo, True)` must be given. + ''')) + last, _ = args[i] # ignore all past ith arg + for a, c in reversed(args[:i]): + last = ITE(c, a, last) + return _canonical(last) + + def _eval_rewrite_as_KroneckerDelta(self, *args, **kwargs): + from sympy.functions.special.tensor_functions import KroneckerDelta + + rules = { + And: [False, False], + Or: [True, True], + Not: [True, False], + Eq: [None, None], + Ne: [None, None] + } + + class UnrecognizedCondition(Exception): + pass + + def rewrite(cond): + if isinstance(cond, Eq): + return KroneckerDelta(*cond.args) + if isinstance(cond, Ne): + return 1 - KroneckerDelta(*cond.args) + + cls, args = type(cond), cond.args + if cls not in rules: + raise UnrecognizedCondition(cls) + + b1, b2 = rules[cls] + k = Mul(*[1 - rewrite(c) for c in args]) if b1 else Mul(*[rewrite(c) for c in args]) + + if b2: + return 1 - k + return k + + conditions = [] + true_value = None + for value, cond in args: + if type(cond) in rules: + conditions.append((value, cond)) + elif cond is S.true: + if true_value is None: + true_value = value + else: + return + + if true_value is not None: + result = true_value + + for value, cond in conditions[::-1]: + try: + k = rewrite(cond) + result = k * value + (1 - k) * result + except UnrecognizedCondition: + return + + return result + + +def piecewise_fold(expr, evaluate=True): + """ + Takes an expression containing a piecewise function and returns the + expression in piecewise form. In addition, any ITE conditions are + rewritten in negation normal form and simplified. + + The final Piecewise is evaluated (default) but if the raw form + is desired, send ``evaluate=False``; if trivial evaluation is + desired, send ``evaluate=None`` and duplicate conditions and + processing of True and False will be handled. + + Examples + ======== + + >>> from sympy import Piecewise, piecewise_fold, S + >>> from sympy.abc import x + >>> p = Piecewise((x, x < 1), (1, S(1) <= x)) + >>> piecewise_fold(x*p) + Piecewise((x**2, x < 1), (x, True)) + + See Also + ======== + + Piecewise + piecewise_exclusive + """ + if not isinstance(expr, Basic) or not expr.has(Piecewise): + return expr + + new_args = [] + if isinstance(expr, (ExprCondPair, Piecewise)): + for e, c in expr.args: + if not isinstance(e, Piecewise): + e = piecewise_fold(e) + # we don't keep Piecewise in condition because + # it has to be checked to see that it's complete + # and we convert it to ITE at that time + assert not c.has(Piecewise) # pragma: no cover + if isinstance(c, ITE): + c = c.to_nnf() + c = simplify_logic(c, form='cnf') + if isinstance(e, Piecewise): + new_args.extend([(piecewise_fold(ei), And(ci, c)) + for ei, ci in e.args]) + else: + new_args.append((e, c)) + else: + # Given + # P1 = Piecewise((e11, c1), (e12, c2), A) + # P2 = Piecewise((e21, c1), (e22, c2), B) + # ... + # the folding of f(P1, P2) is trivially + # Piecewise( + # (f(e11, e21), c1), + # (f(e12, e22), c2), + # (f(Piecewise(A), Piecewise(B)), True)) + # Certain objects end up rewriting themselves as thus, so + # we do that grouping before the more generic folding. + # The following applies this idea when f = Add or f = Mul + # (and the expression is commutative). + if expr.is_Add or expr.is_Mul and expr.is_commutative: + p, args = sift(expr.args, lambda x: x.is_Piecewise, binary=True) + pc = sift(p, lambda x: tuple([c for e,c in x.args])) + for c in list(ordered(pc)): + if len(pc[c]) > 1: + pargs = [list(i.args) for i in pc[c]] + # the first one is the same; there may be more + com = common_prefix(*[ + [i.cond for i in j] for j in pargs]) + n = len(com) + collected = [] + for i in range(n): + collected.append(( + expr.func(*[ai[i].expr for ai in pargs]), + com[i])) + remains = [] + for a in pargs: + if n == len(a): # no more args + continue + if a[n].cond == True: # no longer Piecewise + remains.append(a[n].expr) + else: # restore the remaining Piecewise + remains.append( + Piecewise(*a[n:], evaluate=False)) + if remains: + collected.append((expr.func(*remains), True)) + args.append(Piecewise(*collected, evaluate=False)) + continue + args.extend(pc[c]) + else: + args = expr.args + # fold + folded = list(map(piecewise_fold, args)) + for ec in product(*[ + (i.args if isinstance(i, Piecewise) else + [(i, true)]) for i in folded]): + e, c = zip(*ec) + new_args.append((expr.func(*e), And(*c))) + + if evaluate is None: + # don't return duplicate conditions, otherwise don't evaluate + new_args = list(reversed([(e, c) for c, e in { + c: e for e, c in reversed(new_args)}.items()])) + rv = Piecewise(*new_args, evaluate=evaluate) + if evaluate is None and len(rv.args) == 1 and rv.args[0].cond == True: + return rv.args[0].expr + if any(s.expr.has(Piecewise) for p in rv.atoms(Piecewise) for s in p.args): + return piecewise_fold(rv) + return rv + + +def _clip(A, B, k): + """Return interval B as intervals that are covered by A (keyed + to k) and all other intervals of B not covered by A keyed to -1. + + The reference point of each interval is the rhs; if the lhs is + greater than the rhs then an interval of zero width interval will + result, e.g. (4, 1) is treated like (1, 1). + + Examples + ======== + + >>> from sympy.functions.elementary.piecewise import _clip + >>> from sympy import Tuple + >>> A = Tuple(1, 3) + >>> B = Tuple(2, 4) + >>> _clip(A, B, 0) + [(2, 3, 0), (3, 4, -1)] + + Interpretation: interval portion (2, 3) of interval (2, 4) is + covered by interval (1, 3) and is keyed to 0 as requested; + interval (3, 4) was not covered by (1, 3) and is keyed to -1. + """ + a, b = B + c, d = A + c, d = Min(Max(c, a), b), Min(Max(d, a), b) + a = Min(a, b) + p = [] + if a != c: + p.append((a, c, -1)) + else: + pass + if c != d: + p.append((c, d, k)) + else: + pass + if b != d: + if d == c and p and p[-1][-1] == -1: + p[-1] = p[-1][0], b, -1 + else: + p.append((d, b, -1)) + else: + pass + + return p + + +def piecewise_simplify_arguments(expr, **kwargs): + from sympy.simplify.simplify import simplify + + # simplify conditions + f1 = expr.args[0].cond.free_symbols + args = None + if len(f1) == 1 and not expr.atoms(Eq): + x = f1.pop() + # this won't return intervals involving Eq + # and it won't handle symbols treated as + # booleans + ok, abe_ = expr._intervals(x, err_on_Eq=True) + def include(c, x, a): + "return True if c.subs(x, a) is True, else False" + try: + return c.subs(x, a) == True + except TypeError: + return False + if ok: + args = [] + covered = S.EmptySet + from sympy.sets.sets import Interval + for a, b, e, i in abe_: + c = expr.args[i].cond + incl_a = include(c, x, a) + incl_b = include(c, x, b) + iv = Interval(a, b, not incl_a, not incl_b) + cset = iv - covered + if not cset: + continue + try: + a = cset.inf + except NotImplementedError: + pass # continue with the given `a` + else: + incl_a = include(c, x, a) + if incl_a and incl_b: + if a.is_infinite and b.is_infinite: + c = S.true + elif b.is_infinite: + c = (x > a) if a in covered else (x >= a) + elif a.is_infinite: + c = (x <= b) + elif a in covered: + c = And(a < x, x <= b) + else: + c = And(a <= x, x <= b) + elif incl_a: + if a.is_infinite: + c = (x < b) + elif a in covered: + c = And(a < x, x < b) + else: + c = And(a <= x, x < b) + elif incl_b: + if b.is_infinite: + c = (x > a) + else: + c = And(a < x, x <= b) + else: + if a in covered: + c = (x < b) + else: + c = And(a < x, x < b) + covered |= iv + if a is S.NegativeInfinity and incl_a: + covered |= {S.NegativeInfinity} + if b is S.Infinity and incl_b: + covered |= {S.Infinity} + args.append((e, c)) + if not S.Reals.is_subset(covered): + args.append((Undefined, True)) + if args is None: + args = list(expr.args) + for i in range(len(args)): + e, c = args[i] + if isinstance(c, Basic): + c = simplify(c, **kwargs) + args[i] = (e, c) + + # simplify expressions + doit = kwargs.pop('doit', None) + for i in range(len(args)): + e, c = args[i] + if isinstance(e, Basic): + # Skip doit to avoid growth at every call for some integrals + # and sums, see sympy/sympy#17165 + newe = simplify(e, doit=False, **kwargs) + if newe != e: + e = newe + args[i] = (e, c) + + # restore kwargs flag + if doit is not None: + kwargs['doit'] = doit + + return Piecewise(*args) + + +def _piecewise_collapse_arguments(_args): + newargs = [] # the unevaluated conditions + current_cond = set() # the conditions up to a given e, c pair + for expr, cond in _args: + cond = cond.replace( + lambda _: _.is_Relational, _canonical_coeff) + # Check here if expr is a Piecewise and collapse if one of + # the conds in expr matches cond. This allows the collapsing + # of Piecewise((Piecewise((x,x<0)),x<0)) to Piecewise((x,x<0)). + # This is important when using piecewise_fold to simplify + # multiple Piecewise instances having the same conds. + # Eventually, this code should be able to collapse Piecewise's + # having different intervals, but this will probably require + # using the new assumptions. + if isinstance(expr, Piecewise): + unmatching = [] + for i, (e, c) in enumerate(expr.args): + if c in current_cond: + # this would already have triggered + continue + if c == cond: + if c != True: + # nothing past this condition will ever + # trigger and only those args before this + # that didn't match a previous condition + # could possibly trigger + if unmatching: + expr = Piecewise(*( + unmatching + [(e, c)])) + else: + expr = e + break + else: + unmatching.append((e, c)) + + # check for condition repeats + got = False + # -- if an And contains a condition that was + # already encountered, then the And will be + # False: if the previous condition was False + # then the And will be False and if the previous + # condition is True then then we wouldn't get to + # this point. In either case, we can skip this condition. + for i in ([cond] + + (list(cond.args) if isinstance(cond, And) else + [])): + if i in current_cond: + got = True + break + if got: + continue + + # -- if not(c) is already in current_cond then c is + # a redundant condition in an And. This does not + # apply to Or, however: (e1, c), (e2, Or(~c, d)) + # is not (e1, c), (e2, d) because if c and d are + # both False this would give no results when the + # true answer should be (e2, True) + if isinstance(cond, And): + nonredundant = [] + for c in cond.args: + if isinstance(c, Relational): + if c.negated.canonical in current_cond: + continue + # if a strict inequality appears after + # a non-strict one, then the condition is + # redundant + if isinstance(c, (Lt, Gt)) and ( + c.weak in current_cond): + cond = False + break + nonredundant.append(c) + else: + cond = cond.func(*nonredundant) + elif isinstance(cond, Relational): + if cond.negated.canonical in current_cond: + cond = S.true + + current_cond.add(cond) + + # collect successive e,c pairs when exprs or cond match + if newargs: + if newargs[-1].expr == expr: + orcond = Or(cond, newargs[-1].cond) + if isinstance(orcond, (And, Or)): + orcond = distribute_and_over_or(orcond) + newargs[-1] = ExprCondPair(expr, orcond) + continue + elif newargs[-1].cond == cond: + continue + newargs.append(ExprCondPair(expr, cond)) + return newargs + + +_blessed = lambda e: getattr(e.lhs, '_diff_wrt', False) and ( + getattr(e.rhs, '_diff_wrt', None) or + isinstance(e.rhs, (Rational, NumberSymbol))) + + +def piecewise_simplify(expr, **kwargs): + expr = piecewise_simplify_arguments(expr, **kwargs) + if not isinstance(expr, Piecewise): + return expr + args = list(expr.args) + + args = _piecewise_simplify_eq_and(args) + args = _piecewise_simplify_equal_to_next_segment(args) + return Piecewise(*args) + + +def _piecewise_simplify_equal_to_next_segment(args): + """ + See if expressions valid for an Equal expression happens to evaluate + to the same function as in the next piecewise segment, see: + https://github.com/sympy/sympy/issues/8458 + """ + prevexpr = None + for i, (expr, cond) in reversed(list(enumerate(args))): + if prevexpr is not None: + if isinstance(cond, And): + eqs, other = sift(cond.args, + lambda i: isinstance(i, Eq), binary=True) + elif isinstance(cond, Eq): + eqs, other = [cond], [] + else: + eqs = other = [] + _prevexpr = prevexpr + _expr = expr + if eqs and not other: + eqs = list(ordered(eqs)) + for e in eqs: + # allow 2 args to collapse into 1 for any e + # otherwise limit simplification to only simple-arg + # Eq instances + if len(args) == 2 or _blessed(e): + _prevexpr = _prevexpr.subs(*e.args) + _expr = _expr.subs(*e.args) + # Did it evaluate to the same? + if _prevexpr == _expr: + # Set the expression for the Not equal section to the same + # as the next. These will be merged when creating the new + # Piecewise + args[i] = args[i].func(args[i + 1][0], cond) + else: + # Update the expression that we compare against + prevexpr = expr + else: + prevexpr = expr + return args + + +def _piecewise_simplify_eq_and(args): + """ + Try to simplify conditions and the expression for + equalities that are part of the condition, e.g. + Piecewise((n, And(Eq(n,0), Eq(n + m, 0))), (1, True)) + -> Piecewise((0, And(Eq(n, 0), Eq(m, 0))), (1, True)) + """ + for i, (expr, cond) in enumerate(args): + if isinstance(cond, And): + eqs, other = sift(cond.args, + lambda i: isinstance(i, Eq), binary=True) + elif isinstance(cond, Eq): + eqs, other = [cond], [] + else: + eqs = other = [] + if eqs: + eqs = list(ordered(eqs)) + for j, e in enumerate(eqs): + # these blessed lhs objects behave like Symbols + # and the rhs are simple replacements for the "symbols" + if _blessed(e): + expr = expr.subs(*e.args) + eqs[j + 1:] = [ei.subs(*e.args) for ei in eqs[j + 1:]] + other = [ei.subs(*e.args) for ei in other] + cond = And(*(eqs + other)) + args[i] = args[i].func(expr, cond) + return args + + +def piecewise_exclusive(expr, *, skip_nan=False, deep=True): + """ + Rewrite :class:`Piecewise` with mutually exclusive conditions. + + Explanation + =========== + + SymPy represents the conditions of a :class:`Piecewise` in an + "if-elif"-fashion, allowing more than one condition to be simultaneously + True. The interpretation is that the first condition that is True is the + case that holds. While this is a useful representation computationally it + is not how a piecewise formula is typically shown in a mathematical text. + The :func:`piecewise_exclusive` function can be used to rewrite any + :class:`Piecewise` with more typical mutually exclusive conditions. + + Note that further manipulation of the resulting :class:`Piecewise`, e.g. + simplifying it, will most likely make it non-exclusive. Hence, this is + primarily a function to be used in conjunction with printing the Piecewise + or if one would like to reorder the expression-condition pairs. + + If it is not possible to determine that all possibilities are covered by + the different cases of the :class:`Piecewise` then a final + :class:`~sympy.core.numbers.NaN` case will be included explicitly. This + can be prevented by passing ``skip_nan=True``. + + Examples + ======== + + >>> from sympy import piecewise_exclusive, Symbol, Piecewise, S + >>> x = Symbol('x', real=True) + >>> p = Piecewise((0, x < 0), (S.Half, x <= 0), (1, True)) + >>> piecewise_exclusive(p) + Piecewise((0, x < 0), (1/2, Eq(x, 0)), (1, x > 0)) + >>> piecewise_exclusive(Piecewise((2, x > 1))) + Piecewise((2, x > 1), (nan, x <= 1)) + >>> piecewise_exclusive(Piecewise((2, x > 1)), skip_nan=True) + Piecewise((2, x > 1)) + + Parameters + ========== + + expr: a SymPy expression. + Any :class:`Piecewise` in the expression will be rewritten. + skip_nan: ``bool`` (default ``False``) + If ``skip_nan`` is set to ``True`` then a final + :class:`~sympy.core.numbers.NaN` case will not be included. + deep: ``bool`` (default ``True``) + If ``deep`` is ``True`` then :func:`piecewise_exclusive` will rewrite + any :class:`Piecewise` subexpressions in ``expr`` rather than just + rewriting ``expr`` itself. + + Returns + ======= + + An expression equivalent to ``expr`` but where all :class:`Piecewise` have + been rewritten with mutually exclusive conditions. + + See Also + ======== + + Piecewise + piecewise_fold + """ + + def make_exclusive(*pwargs): + + cumcond = false + newargs = [] + + # Handle the first n-1 cases + for expr_i, cond_i in pwargs[:-1]: + cancond = And(cond_i, Not(cumcond)).simplify() + cumcond = Or(cond_i, cumcond).simplify() + newargs.append((expr_i, cancond)) + + # For the nth case defer simplification of cumcond + expr_n, cond_n = pwargs[-1] + cancond_n = And(cond_n, Not(cumcond)).simplify() + newargs.append((expr_n, cancond_n)) + + if not skip_nan: + cumcond = Or(cond_n, cumcond).simplify() + if cumcond is not true: + newargs.append((Undefined, Not(cumcond).simplify())) + + return Piecewise(*newargs, evaluate=False) + + if deep: + return expr.replace(Piecewise, make_exclusive) + elif isinstance(expr, Piecewise): + return make_exclusive(*expr.args) + else: + return expr diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_complexes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_complexes.py new file mode 100644 index 0000000000000000000000000000000000000000..699c0fef966c99147b713aaa80710b7b8cf21c73 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_complexes.py @@ -0,0 +1,1030 @@ +from sympy.core.function import (Derivative, Function, Lambda, expand, PoleError) +from sympy.core.numbers import (E, I, Rational, comp, nan, oo, pi, zoo) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (Abs, adjoint, arg, conjugate, im, re, sign, transpose) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acos, atan, atan2, cos, sin) +from sympy.functions.elementary.hyperbolic import sinh +from sympy.functions.special.delta_functions import (DiracDelta, Heaviside) +from sympy.integrals.integrals import Integral +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.funcmatrix import FunctionMatrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.immutable import (ImmutableMatrix, ImmutableSparseMatrix) +from sympy.matrices import SparseMatrix +from sympy.sets.sets import Interval +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.series.order import Order +from sympy.testing.pytest import XFAIL, raises, _both_exp_pow + + +def N_equals(a, b): + """Check whether two complex numbers are numerically close""" + return comp(a.n(), b.n(), 1.e-6) + + +def test_re(): + x, y = symbols('x,y') + a, b = symbols('a,b', real=True) + + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + + assert re(nan) is nan + + assert re(oo) is oo + assert re(-oo) is -oo + + assert re(0) == 0 + + assert re(1) == 1 + assert re(-1) == -1 + + assert re(E) == E + assert re(-E) == -E + + assert unchanged(re, x) + assert re(x*I) == -im(x) + assert re(r*I) == 0 + assert re(r) == r + assert re(i*I) == I * i + assert re(i) == 0 + + assert re(x + y) == re(x) + re(y) + assert re(x + r) == re(x) + r + + assert re(re(x)) == re(x) + + assert re(2 + I) == 2 + assert re(x + I) == re(x) + + assert re(x + y*I) == re(x) - im(y) + assert re(x + r*I) == re(x) + + assert re(log(2*I)) == log(2) + + assert re((2 + I)**2).expand(complex=True) == 3 + + assert re(conjugate(x)) == re(x) + assert conjugate(re(x)) == re(x) + + assert re(x).as_real_imag() == (re(x), 0) + + assert re(i*r*x).diff(r) == re(i*x) + assert re(i*r*x).diff(i) == I*r*im(x) + + assert re( + sqrt(a + b*I)) == (a**2 + b**2)**Rational(1, 4)*cos(atan2(b, a)/2) + assert re(a * (2 + b*I)) == 2*a + + assert re((1 + sqrt(a + b*I))/2) == \ + (a**2 + b**2)**Rational(1, 4)*cos(atan2(b, a)/2)/2 + S.Half + + assert re(x).rewrite(im) == x - S.ImaginaryUnit*im(x) + assert (x + re(y)).rewrite(re, im) == x + y - S.ImaginaryUnit*im(y) + + a = Symbol('a', algebraic=True) + t = Symbol('t', transcendental=True) + x = Symbol('x') + assert re(a).is_algebraic + assert re(x).is_algebraic is None + assert re(t).is_algebraic is False + + assert re(S.ComplexInfinity) is S.NaN + + n, m, l = symbols('n m l') + A = MatrixSymbol('A',n,m) + assert re(A) == (S.Half) * (A + conjugate(A)) + + A = Matrix([[1 + 4*I,2],[0, -3*I]]) + assert re(A) == Matrix([[1, 2],[0, 0]]) + + A = ImmutableMatrix([[1 + 3*I, 3-2*I],[0, 2*I]]) + assert re(A) == ImmutableMatrix([[1, 3],[0, 0]]) + + X = SparseMatrix([[2*j + i*I for i in range(5)] for j in range(5)]) + assert re(X) - Matrix([[0, 0, 0, 0, 0], + [2, 2, 2, 2, 2], + [4, 4, 4, 4, 4], + [6, 6, 6, 6, 6], + [8, 8, 8, 8, 8]]) == Matrix.zeros(5) + + assert im(X) - Matrix([[0, 1, 2, 3, 4], + [0, 1, 2, 3, 4], + [0, 1, 2, 3, 4], + [0, 1, 2, 3, 4], + [0, 1, 2, 3, 4]]) == Matrix.zeros(5) + + X = FunctionMatrix(3, 3, Lambda((n, m), n + m*I)) + assert re(X) == Matrix([[0, 0, 0], [1, 1, 1], [2, 2, 2]]) + + +def test_im(): + x, y = symbols('x,y') + a, b = symbols('a,b', real=True) + + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + + assert im(nan) is nan + + assert im(oo*I) is oo + assert im(-oo*I) is -oo + + assert im(0) == 0 + + assert im(1) == 0 + assert im(-1) == 0 + + assert im(E*I) == E + assert im(-E*I) == -E + + assert unchanged(im, x) + assert im(x*I) == re(x) + assert im(r*I) == r + assert im(r) == 0 + assert im(i*I) == 0 + assert im(i) == -I * i + + assert im(x + y) == im(x) + im(y) + assert im(x + r) == im(x) + assert im(x + r*I) == im(x) + r + + assert im(im(x)*I) == im(x) + + assert im(2 + I) == 1 + assert im(x + I) == im(x) + 1 + + assert im(x + y*I) == im(x) + re(y) + assert im(x + r*I) == im(x) + r + + assert im(log(2*I)) == pi/2 + + assert im((2 + I)**2).expand(complex=True) == 4 + + assert im(conjugate(x)) == -im(x) + assert conjugate(im(x)) == im(x) + + assert im(x).as_real_imag() == (im(x), 0) + + assert im(i*r*x).diff(r) == im(i*x) + assert im(i*r*x).diff(i) == -I * re(r*x) + + assert im( + sqrt(a + b*I)) == (a**2 + b**2)**Rational(1, 4)*sin(atan2(b, a)/2) + assert im(a * (2 + b*I)) == a*b + + assert im((1 + sqrt(a + b*I))/2) == \ + (a**2 + b**2)**Rational(1, 4)*sin(atan2(b, a)/2)/2 + + assert im(x).rewrite(re) == -S.ImaginaryUnit * (x - re(x)) + assert (x + im(y)).rewrite(im, re) == x - S.ImaginaryUnit * (y - re(y)) + + a = Symbol('a', algebraic=True) + t = Symbol('t', transcendental=True) + x = Symbol('x') + assert re(a).is_algebraic + assert re(x).is_algebraic is None + assert re(t).is_algebraic is False + + assert im(S.ComplexInfinity) is S.NaN + + n, m, l = symbols('n m l') + A = MatrixSymbol('A',n,m) + + assert im(A) == (S.One/(2*I)) * (A - conjugate(A)) + + A = Matrix([[1 + 4*I, 2],[0, -3*I]]) + assert im(A) == Matrix([[4, 0],[0, -3]]) + + A = ImmutableMatrix([[1 + 3*I, 3-2*I],[0, 2*I]]) + assert im(A) == ImmutableMatrix([[3, -2],[0, 2]]) + + X = ImmutableSparseMatrix( + [[i*I + i for i in range(5)] for i in range(5)]) + Y = SparseMatrix([list(range(5)) for i in range(5)]) + assert im(X).as_immutable() == Y + + X = FunctionMatrix(3, 3, Lambda((n, m), n + m*I)) + assert im(X) == Matrix([[0, 1, 2], [0, 1, 2], [0, 1, 2]]) + +def test_sign(): + assert sign(1.2) == 1 + assert sign(-1.2) == -1 + assert sign(3*I) == I + assert sign(-3*I) == -I + assert sign(0) == 0 + assert sign(0, evaluate=False).doit() == 0 + assert sign(oo, evaluate=False).doit() == 1 + assert sign(nan) is nan + assert sign(2 + 2*I).doit() == sqrt(2)*(2 + 2*I)/4 + assert sign(2 + 3*I).simplify() == sign(2 + 3*I) + assert sign(2 + 2*I).simplify() == sign(1 + I) + assert sign(im(sqrt(1 - sqrt(3)))) == 1 + assert sign(sqrt(1 - sqrt(3))) == I + + x = Symbol('x') + assert sign(x).is_finite is True + assert sign(x).is_complex is True + assert sign(x).is_imaginary is None + assert sign(x).is_integer is None + assert sign(x).is_real is None + assert sign(x).is_zero is None + assert sign(x).doit() == sign(x) + assert sign(1.2*x) == sign(x) + assert sign(2*x) == sign(x) + assert sign(I*x) == I*sign(x) + assert sign(-2*I*x) == -I*sign(x) + assert sign(conjugate(x)) == conjugate(sign(x)) + + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + m = Symbol('m', negative=True) + assert sign(2*p*x) == sign(x) + assert sign(n*x) == -sign(x) + assert sign(n*m*x) == sign(x) + + x = Symbol('x', imaginary=True) + assert sign(x).is_imaginary is True + assert sign(x).is_integer is False + assert sign(x).is_real is False + assert sign(x).is_zero is False + assert sign(x).diff(x) == 2*DiracDelta(-I*x) + assert sign(x).doit() == x / Abs(x) + assert conjugate(sign(x)) == -sign(x) + + x = Symbol('x', real=True) + assert sign(x).is_imaginary is False + assert sign(x).is_integer is True + assert sign(x).is_real is True + assert sign(x).is_zero is None + assert sign(x).diff(x) == 2*DiracDelta(x) + assert sign(x).doit() == sign(x) + assert conjugate(sign(x)) == sign(x) + + x = Symbol('x', nonzero=True) + assert sign(x).is_imaginary is False + assert sign(x).is_integer is True + assert sign(x).is_real is True + assert sign(x).is_zero is False + assert sign(x).doit() == x / Abs(x) + assert sign(Abs(x)) == 1 + assert Abs(sign(x)) == 1 + + x = Symbol('x', positive=True) + assert sign(x).is_imaginary is False + assert sign(x).is_integer is True + assert sign(x).is_real is True + assert sign(x).is_zero is False + assert sign(x).doit() == x / Abs(x) + assert sign(Abs(x)) == 1 + assert Abs(sign(x)) == 1 + + x = 0 + assert sign(x).is_imaginary is False + assert sign(x).is_integer is True + assert sign(x).is_real is True + assert sign(x).is_zero is True + assert sign(x).doit() == 0 + assert sign(Abs(x)) == 0 + assert Abs(sign(x)) == 0 + + nz = Symbol('nz', nonzero=True, integer=True) + assert sign(nz).is_imaginary is False + assert sign(nz).is_integer is True + assert sign(nz).is_real is True + assert sign(nz).is_zero is False + assert sign(nz)**2 == 1 + assert (sign(nz)**3).args == (sign(nz), 3) + + assert sign(Symbol('x', nonnegative=True)).is_nonnegative + assert sign(Symbol('x', nonnegative=True)).is_nonpositive is None + assert sign(Symbol('x', nonpositive=True)).is_nonnegative is None + assert sign(Symbol('x', nonpositive=True)).is_nonpositive + assert sign(Symbol('x', real=True)).is_nonnegative is None + assert sign(Symbol('x', real=True)).is_nonpositive is None + assert sign(Symbol('x', real=True, zero=False)).is_nonpositive is None + + x, y = Symbol('x', real=True), Symbol('y') + f = Function('f') + assert sign(x).rewrite(Piecewise) == \ + Piecewise((1, x > 0), (-1, x < 0), (0, True)) + assert sign(y).rewrite(Piecewise) == sign(y) + assert sign(x).rewrite(Heaviside) == 2*Heaviside(x, H0=S(1)/2) - 1 + assert sign(y).rewrite(Heaviside) == sign(y) + assert sign(y).rewrite(Abs) == Piecewise((0, Eq(y, 0)), (y/Abs(y), True)) + assert sign(f(y)).rewrite(Abs) == Piecewise((0, Eq(f(y), 0)), (f(y)/Abs(f(y)), True)) + + # evaluate what can be evaluated + assert sign(exp_polar(I*pi)*pi) is S.NegativeOne + + eq = -sqrt(10 + 6*sqrt(3)) + sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) + # if there is a fast way to know when and when you cannot prove an + # expression like this is zero then the equality to zero is ok + assert sign(eq).func is sign or sign(eq) == 0 + # but sometimes it's hard to do this so it's better not to load + # abs down with tests that will be very slow + q = 1 + sqrt(2) - 2*sqrt(3) + 1331*sqrt(6) + p = expand(q**3)**Rational(1, 3) + d = p - q + assert sign(d).func is sign or sign(d) == 0 + + +def test_as_real_imag(): + n = pi**1000 + # the special code for working out the real + # and complex parts of a power with Integer exponent + # should not run if there is no imaginary part, hence + # this should not hang + assert n.as_real_imag() == (n, 0) + + # issue 6261 + x = Symbol('x') + assert sqrt(x).as_real_imag() == \ + ((re(x)**2 + im(x)**2)**Rational(1, 4)*cos(atan2(im(x), re(x))/2), + (re(x)**2 + im(x)**2)**Rational(1, 4)*sin(atan2(im(x), re(x))/2)) + + # issue 3853 + a, b = symbols('a,b', real=True) + assert ((1 + sqrt(a + b*I))/2).as_real_imag() == \ + ( + (a**2 + b**2)**Rational( + 1, 4)*cos(atan2(b, a)/2)/2 + S.Half, + (a**2 + b**2)**Rational(1, 4)*sin(atan2(b, a)/2)/2) + + assert sqrt(a**2).as_real_imag() == (sqrt(a**2), 0) + i = symbols('i', imaginary=True) + assert sqrt(i**2).as_real_imag() == (0, abs(i)) + + assert ((1 + I)/(1 - I)).as_real_imag() == (0, 1) + assert ((1 + I)**3/(1 - I)).as_real_imag() == (-2, 0) + + +@XFAIL +def test_sign_issue_3068(): + n = pi**1000 + i = int(n) + x = Symbol('x') + assert (n - i).round() == 1 # doesn't hang + assert sign(n - i) == 1 + # perhaps it's not possible to get the sign right when + # only 1 digit is being requested for this situation; + # 2 digits works + assert (n - x).n(1, subs={x: i}) > 0 + assert (n - x).n(2, subs={x: i}) > 0 + + +def test_Abs(): + raises(TypeError, lambda: Abs(Interval(2, 3))) # issue 8717 + + x, y = symbols('x,y') + assert sign(sign(x)) == sign(x) + assert sign(x*y).func is sign + assert Abs(0) == 0 + assert Abs(1) == 1 + assert Abs(-1) == 1 + assert Abs(I) == 1 + assert Abs(-I) == 1 + assert Abs(nan) is nan + assert Abs(zoo) is oo + assert Abs(I * pi) == pi + assert Abs(-I * pi) == pi + assert Abs(I * x) == Abs(x) + assert Abs(-I * x) == Abs(x) + assert Abs(-2*x) == 2*Abs(x) + assert Abs(-2.0*x) == 2.0*Abs(x) + assert Abs(2*pi*x*y) == 2*pi*Abs(x*y) + assert Abs(conjugate(x)) == Abs(x) + assert conjugate(Abs(x)) == Abs(x) + assert Abs(x).expand(complex=True) == sqrt(re(x)**2 + im(x)**2) + + a = Symbol('a', positive=True) + assert Abs(2*pi*x*a) == 2*pi*a*Abs(x) + assert Abs(2*pi*I*x*a) == 2*pi*a*Abs(x) + + x = Symbol('x', real=True) + n = Symbol('n', integer=True) + assert Abs((-1)**n) == 1 + assert x**(2*n) == Abs(x)**(2*n) + assert Abs(x).diff(x) == sign(x) + assert abs(x) == Abs(x) # Python built-in + assert Abs(x)**3 == x**2*Abs(x) + assert Abs(x)**4 == x**4 + assert ( + Abs(x)**(3*n)).args == (Abs(x), 3*n) # leave symbolic odd unchanged + assert (1/Abs(x)).args == (Abs(x), -1) + assert 1/Abs(x)**3 == 1/(x**2*Abs(x)) + assert Abs(x)**-3 == Abs(x)/(x**4) + assert Abs(x**3) == x**2*Abs(x) + assert Abs(I**I) == exp(-pi/2) + assert Abs((4 + 5*I)**(6 + 7*I)) == 68921*exp(-7*atan(Rational(5, 4))) + y = Symbol('y', real=True) + assert Abs(I**y) == 1 + y = Symbol('y') + assert Abs(I**y) == exp(-pi*im(y)/2) + + x = Symbol('x', imaginary=True) + assert Abs(x).diff(x) == -sign(x) + + eq = -sqrt(10 + 6*sqrt(3)) + sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) + # if there is a fast way to know when you can and when you cannot prove an + # expression like this is zero then the equality to zero is ok + assert abs(eq).func is Abs or abs(eq) == 0 + # but sometimes it's hard to do this so it's better not to load + # abs down with tests that will be very slow + q = 1 + sqrt(2) - 2*sqrt(3) + 1331*sqrt(6) + p = expand(q**3)**Rational(1, 3) + d = p - q + assert abs(d).func is Abs or abs(d) == 0 + + assert Abs(4*exp(pi*I/4)) == 4 + assert Abs(3**(2 + I)) == 9 + assert Abs((-3)**(1 - I)) == 3*exp(pi) + + assert Abs(oo) is oo + assert Abs(-oo) is oo + assert Abs(oo + I) is oo + assert Abs(oo + I*oo) is oo + + a = Symbol('a', algebraic=True) + t = Symbol('t', transcendental=True) + x = Symbol('x') + assert re(a).is_algebraic + assert re(x).is_algebraic is None + assert re(t).is_algebraic is False + assert Abs(x).fdiff() == sign(x) + raises(ArgumentIndexError, lambda: Abs(x).fdiff(2)) + + # doesn't have recursion error + arg = sqrt(acos(1 - I)*acos(1 + I)) + assert abs(arg) == arg + + # special handling to put Abs in denom + assert abs(1/x) == 1/Abs(x) + e = abs(2/x**2) + assert e.is_Mul and e == 2/Abs(x**2) + assert unchanged(Abs, y/x) + assert unchanged(Abs, x/(x + 1)) + assert unchanged(Abs, x*y) + p = Symbol('p', positive=True) + assert abs(x/p) == abs(x)/p + + # coverage + assert unchanged(Abs, Symbol('x', real=True)**y) + # issue 19627 + f = Function('f', positive=True) + assert sqrt(f(x)**2) == f(x) + # issue 21625 + assert unchanged(Abs, S("im(acos(-i + acosh(-g + i)))")) + + +def test_Abs_rewrite(): + x = Symbol('x', real=True) + a = Abs(x).rewrite(Heaviside).expand() + assert a == x*Heaviside(x) - x*Heaviside(-x) + for i in [-2, -1, 0, 1, 2]: + assert a.subs(x, i) == abs(i) + y = Symbol('y') + assert Abs(y).rewrite(Heaviside) == Abs(y) + + x, y = Symbol('x', real=True), Symbol('y') + assert Abs(x).rewrite(Piecewise) == Piecewise((x, x >= 0), (-x, True)) + assert Abs(y).rewrite(Piecewise) == Abs(y) + assert Abs(y).rewrite(sign) == y/sign(y) + + i = Symbol('i', imaginary=True) + assert abs(i).rewrite(Piecewise) == Piecewise((I*i, I*i >= 0), (-I*i, True)) + + + assert Abs(y).rewrite(conjugate) == sqrt(y*conjugate(y)) + assert Abs(i).rewrite(conjugate) == sqrt(-i**2) # == -I*i + + y = Symbol('y', extended_real=True) + assert (Abs(exp(-I*x)-exp(-I*y))**2).rewrite(conjugate) == \ + -exp(I*x)*exp(-I*y) + 2 - exp(-I*x)*exp(I*y) + + +def test_Abs_real(): + # test some properties of abs that only apply + # to real numbers + x = Symbol('x', complex=True) + assert sqrt(x**2) != Abs(x) + assert Abs(x**2) != x**2 + + x = Symbol('x', real=True) + assert sqrt(x**2) == Abs(x) + assert Abs(x**2) == x**2 + + # if the symbol is zero, the following will still apply + nn = Symbol('nn', nonnegative=True, real=True) + np = Symbol('np', nonpositive=True, real=True) + assert Abs(nn) == nn + assert Abs(np) == -np + + +def test_Abs_properties(): + x = Symbol('x') + assert Abs(x).is_real is None + assert Abs(x).is_extended_real is True + assert Abs(x).is_rational is None + assert Abs(x).is_positive is None + assert Abs(x).is_nonnegative is None + assert Abs(x).is_extended_positive is None + assert Abs(x).is_extended_nonnegative is True + + f = Symbol('x', finite=True) + assert Abs(f).is_real is True + assert Abs(f).is_extended_real is True + assert Abs(f).is_rational is None + assert Abs(f).is_positive is None + assert Abs(f).is_nonnegative is True + assert Abs(f).is_extended_positive is None + assert Abs(f).is_extended_nonnegative is True + + z = Symbol('z', complex=True, zero=False) + assert Abs(z).is_real is True # since complex implies finite + assert Abs(z).is_extended_real is True + assert Abs(z).is_rational is None + assert Abs(z).is_positive is True + assert Abs(z).is_extended_positive is True + assert Abs(z).is_zero is False + + p = Symbol('p', positive=True) + assert Abs(p).is_real is True + assert Abs(p).is_extended_real is True + assert Abs(p).is_rational is None + assert Abs(p).is_positive is True + assert Abs(p).is_zero is False + + q = Symbol('q', rational=True) + assert Abs(q).is_real is True + assert Abs(q).is_rational is True + assert Abs(q).is_integer is None + assert Abs(q).is_positive is None + assert Abs(q).is_nonnegative is True + + i = Symbol('i', integer=True) + assert Abs(i).is_real is True + assert Abs(i).is_integer is True + assert Abs(i).is_positive is None + assert Abs(i).is_nonnegative is True + + e = Symbol('n', even=True) + ne = Symbol('ne', real=True, even=False) + assert Abs(e).is_even is True + assert Abs(ne).is_even is False + assert Abs(i).is_even is None + + o = Symbol('n', odd=True) + no = Symbol('no', real=True, odd=False) + assert Abs(o).is_odd is True + assert Abs(no).is_odd is False + assert Abs(i).is_odd is None + + +def test_abs(): + # this tests that abs calls Abs; don't rename to + # test_Abs since that test is already above + a = Symbol('a', positive=True) + assert abs(I*(1 + a)**2) == (1 + a)**2 + + +def test_arg(): + assert arg(0) is nan + assert arg(1) == 0 + assert arg(-1) == pi + assert arg(I) == pi/2 + assert arg(-I) == -pi/2 + assert arg(1 + I) == pi/4 + assert arg(-1 + I) == pi*Rational(3, 4) + assert arg(1 - I) == -pi/4 + assert arg(exp_polar(4*pi*I)) == 4*pi + assert arg(exp_polar(-7*pi*I)) == -7*pi + assert arg(exp_polar(5 - 3*pi*I/4)) == pi*Rational(-3, 4) + + assert arg(exp(I*pi/7)) == pi/7 # issue 17300 + assert arg(exp(16*I)) == 16 - 6*pi + assert arg(exp(13*I*pi/12)) == -11*pi/12 + assert arg(exp(123 - 5*I)) == -5 + 2*pi + assert arg(exp(sin(1 + 3*I))) == -2*pi + cos(1)*sinh(3) + r = Symbol('r', real=True) + assert arg(exp(r - 2*I)) == -2 + + f = Function('f') + assert not arg(f(0) + I*f(1)).atoms(re) + + # check nesting + x = Symbol('x') + assert arg(arg(arg(x))) is not S.NaN + assert arg(arg(arg(arg(x)))) is S.NaN + r = Symbol('r', extended_real=True) + assert arg(arg(r)) is not S.NaN + assert arg(arg(arg(r))) is S.NaN + + p = Function('p', extended_positive=True) + assert arg(p(x)) == 0 + assert arg((3 + I)*p(x)) == arg(3 + I) + + p = Symbol('p', positive=True) + assert arg(p) == 0 + assert arg(p*I) == pi/2 + + n = Symbol('n', negative=True) + assert arg(n) == pi + assert arg(n*I) == -pi/2 + + x = Symbol('x') + assert conjugate(arg(x)) == arg(x) + + e = p + I*p**2 + assert arg(e) == arg(1 + p*I) + # make sure sign doesn't swap + e = -2*p + 4*I*p**2 + assert arg(e) == arg(-1 + 2*p*I) + # make sure sign isn't lost + x = symbols('x', real=True) # could be zero + e = x + I*x + assert arg(e) == arg(x*(1 + I)) + assert arg(e/p) == arg(x*(1 + I)) + e = p*cos(p) + I*log(p)*exp(p) + assert arg(e).args[0] == e + # keep it simple -- let the user do more advanced cancellation + e = (p + 1) + I*(p**2 - 1) + assert arg(e).args[0] == e + + f = Function('f') + e = 2*x*(f(0) - 1) - 2*x*f(0) + assert arg(e) == arg(-2*x) + assert arg(f(0)).func == arg and arg(f(0)).args == (f(0),) + + +def test_arg_rewrite(): + assert arg(1 + I) == atan2(1, 1) + + x = Symbol('x', real=True) + y = Symbol('y', real=True) + assert arg(x + I*y).rewrite(atan2) == atan2(y, x) + + +def test_arg_leading_term_and_series(): + x = Symbol('x') + assert arg(x).as_leading_term(x, cdir = 1) == 0 + assert arg(x).as_leading_term(x, cdir = -1) == pi + raises(PoleError, lambda: arg(x + I).as_leading_term(x, cdir = 1)) + raises(PoleError, lambda: arg(2*x).as_leading_term(x, cdir = I)) + + assert arg(x).nseries(x) == 0 + assert arg(x).nseries(x, n=0) == Order(1) + + +def test_adjoint(): + a = Symbol('a', antihermitian=True) + b = Symbol('b', hermitian=True) + assert adjoint(a) == -a + assert adjoint(I*a) == I*a + assert adjoint(b) == b + assert adjoint(I*b) == -I*b + assert adjoint(a*b) == -b*a + assert adjoint(I*a*b) == I*b*a + + x, y = symbols('x y') + assert adjoint(adjoint(x)) == x + assert adjoint(x + y) == conjugate(x) + conjugate(y) + assert adjoint(x - y) == conjugate(x) - conjugate(y) + assert adjoint(x * y) == conjugate(x) * conjugate(y) + assert adjoint(x / y) == conjugate(x) / conjugate(y) + assert adjoint(-x) == -conjugate(x) + + x, y = symbols('x y', commutative=False) + assert adjoint(adjoint(x)) == x + assert adjoint(x + y) == adjoint(x) + adjoint(y) + assert adjoint(x - y) == adjoint(x) - adjoint(y) + assert adjoint(x * y) == adjoint(y) * adjoint(x) + assert adjoint(x / y) == 1 / adjoint(y) * adjoint(x) + assert adjoint(-x) == -adjoint(x) + + +def test_conjugate(): + a = Symbol('a', real=True) + b = Symbol('b', imaginary=True) + assert conjugate(a) == a + assert conjugate(I*a) == -I*a + assert conjugate(b) == -b + assert conjugate(I*b) == I*b + assert conjugate(a*b) == -a*b + assert conjugate(I*a*b) == I*a*b + + x, y = symbols('x y') + assert conjugate(conjugate(x)) == x + assert conjugate(x).inverse() == conjugate + assert conjugate(x + y) == conjugate(x) + conjugate(y) + assert conjugate(x - y) == conjugate(x) - conjugate(y) + assert conjugate(x * y) == conjugate(x) * conjugate(y) + assert conjugate(x / y) == conjugate(x) / conjugate(y) + assert conjugate(-x) == -conjugate(x) + + a = Symbol('a', algebraic=True) + t = Symbol('t', transcendental=True) + assert re(a).is_algebraic + assert re(x).is_algebraic is None + assert re(t).is_algebraic is False + + +def test_conjugate_transpose(): + x = Symbol('x', commutative=False) + assert conjugate(transpose(x)) == adjoint(x) + assert transpose(conjugate(x)) == adjoint(x) + assert adjoint(transpose(x)) == conjugate(x) + assert transpose(adjoint(x)) == conjugate(x) + assert adjoint(conjugate(x)) == transpose(x) + assert conjugate(adjoint(x)) == transpose(x) + + x = Symbol('x') + assert conjugate(x) == adjoint(x) + assert transpose(x) == x + + +def test_transpose(): + a = Symbol('a', complex=True) + assert transpose(a) == a + assert transpose(I*a) == I*a + + x, y = symbols('x y') + assert transpose(transpose(x)) == x + assert transpose(x + y) == x + y + assert transpose(x - y) == x - y + assert transpose(x * y) == x * y + assert transpose(x / y) == x / y + assert transpose(-x) == -x + + x, y = symbols('x y', commutative=False) + assert transpose(transpose(x)) == x + assert transpose(x + y) == transpose(x) + transpose(y) + assert transpose(x - y) == transpose(x) - transpose(y) + assert transpose(x * y) == transpose(y) * transpose(x) + assert transpose(x / y) == 1 / transpose(y) * transpose(x) + assert transpose(-x) == -transpose(x) + + +@_both_exp_pow +def test_polarify(): + from sympy.functions.elementary.complexes import (polar_lift, polarify) + x = Symbol('x') + z = Symbol('z', polar=True) + f = Function('f') + ES = {} + + assert polarify(-1) == (polar_lift(-1), ES) + assert polarify(1 + I) == (polar_lift(1 + I), ES) + + assert polarify(exp(x), subs=False) == exp(x) + assert polarify(1 + x, subs=False) == 1 + x + assert polarify(f(I) + x, subs=False) == f(polar_lift(I)) + x + + assert polarify(x, lift=True) == polar_lift(x) + assert polarify(z, lift=True) == z + assert polarify(f(x), lift=True) == f(polar_lift(x)) + assert polarify(1 + x, lift=True) == polar_lift(1 + x) + assert polarify(1 + f(x), lift=True) == polar_lift(1 + f(polar_lift(x))) + + newex, subs = polarify(f(x) + z) + assert newex.subs(subs) == f(x) + z + + mu = Symbol("mu") + sigma = Symbol("sigma", positive=True) + + # Make sure polarify(lift=True) doesn't try to lift the integration + # variable + assert polarify( + Integral(sqrt(2)*x*exp(-(-mu + x)**2/(2*sigma**2))/(2*sqrt(pi)*sigma), + (x, -oo, oo)), lift=True) == Integral(sqrt(2)*(sigma*exp_polar(0))**exp_polar(I*pi)* + exp((sigma*exp_polar(0))**(2*exp_polar(I*pi))*exp_polar(I*pi)*polar_lift(-mu + x)** + (2*exp_polar(0))/2)*exp_polar(0)*polar_lift(x)/(2*sqrt(pi)), (x, -oo, oo)) + + +def test_unpolarify(): + from sympy.functions.elementary.complexes import (polar_lift, principal_branch, unpolarify) + from sympy.core.relational import Ne + from sympy.functions.elementary.hyperbolic import tanh + from sympy.functions.special.error_functions import erf + from sympy.functions.special.gamma_functions import (gamma, uppergamma) + from sympy.abc import x + p = exp_polar(7*I) + 1 + u = exp(7*I) + 1 + + assert unpolarify(1) == 1 + assert unpolarify(p) == u + assert unpolarify(p**2) == u**2 + assert unpolarify(p**x) == p**x + assert unpolarify(p*x) == u*x + assert unpolarify(p + x) == u + x + assert unpolarify(sqrt(sin(p))) == sqrt(sin(u)) + + # Test reduction to principal branch 2*pi. + t = principal_branch(x, 2*pi) + assert unpolarify(t) == x + assert unpolarify(sqrt(t)) == sqrt(t) + + # Test exponents_only. + assert unpolarify(p**p, exponents_only=True) == p**u + assert unpolarify(uppergamma(x, p**p)) == uppergamma(x, p**u) + + # Test functions. + assert unpolarify(sin(p)) == sin(u) + assert unpolarify(tanh(p)) == tanh(u) + assert unpolarify(gamma(p)) == gamma(u) + assert unpolarify(erf(p)) == erf(u) + assert unpolarify(uppergamma(x, p)) == uppergamma(x, p) + + assert unpolarify(uppergamma(sin(p), sin(p + exp_polar(0)))) == \ + uppergamma(sin(u), sin(u + 1)) + assert unpolarify(uppergamma(polar_lift(0), 2*exp_polar(0))) == \ + uppergamma(0, 2) + + assert unpolarify(Eq(p, 0)) == Eq(u, 0) + assert unpolarify(Ne(p, 0)) == Ne(u, 0) + assert unpolarify(polar_lift(x) > 0) == (x > 0) + + # Test bools + assert unpolarify(True) is True + + +def test_issue_4035(): + x = Symbol('x') + assert Abs(x).expand(trig=True) == Abs(x) + assert sign(x).expand(trig=True) == sign(x) + assert arg(x).expand(trig=True) == arg(x) + + +def test_issue_3206(): + x = Symbol('x') + assert Abs(Abs(x)) == Abs(x) + + +def test_issue_4754_derivative_conjugate(): + x = Symbol('x', real=True) + y = Symbol('y', imaginary=True) + f = Function('f') + assert (f(x).conjugate()).diff(x) == (f(x).diff(x)).conjugate() + assert (f(y).conjugate()).diff(y) == -(f(y).diff(y)).conjugate() + + +def test_derivatives_issue_4757(): + x = Symbol('x', real=True) + y = Symbol('y', imaginary=True) + f = Function('f') + assert re(f(x)).diff(x) == re(f(x).diff(x)) + assert im(f(x)).diff(x) == im(f(x).diff(x)) + assert re(f(y)).diff(y) == -I*im(f(y).diff(y)) + assert im(f(y)).diff(y) == -I*re(f(y).diff(y)) + assert Abs(f(x)).diff(x).subs(f(x), 1 + I*x).doit() == x/sqrt(1 + x**2) + assert arg(f(x)).diff(x).subs(f(x), 1 + I*x**2).doit() == 2*x/(1 + x**4) + assert Abs(f(y)).diff(y).subs(f(y), 1 + y).doit() == -y/sqrt(1 - y**2) + assert arg(f(y)).diff(y).subs(f(y), I + y**2).doit() == 2*y/(1 + y**4) + + +def test_issue_11413(): + from sympy.simplify.simplify import simplify + v0 = Symbol('v0') + v1 = Symbol('v1') + v2 = Symbol('v2') + V = Matrix([[v0],[v1],[v2]]) + U = V.normalized() + assert U == Matrix([ + [v0/sqrt(Abs(v0)**2 + Abs(v1)**2 + Abs(v2)**2)], + [v1/sqrt(Abs(v0)**2 + Abs(v1)**2 + Abs(v2)**2)], + [v2/sqrt(Abs(v0)**2 + Abs(v1)**2 + Abs(v2)**2)]]) + U.norm = sqrt(v0**2/(v0**2 + v1**2 + v2**2) + v1**2/(v0**2 + v1**2 + v2**2) + v2**2/(v0**2 + v1**2 + v2**2)) + assert simplify(U.norm) == 1 + + +def test_periodic_argument(): + from sympy.functions.elementary.complexes import (periodic_argument, polar_lift, principal_branch, unbranched_argument) + x = Symbol('x') + p = Symbol('p', positive=True) + + assert unbranched_argument(2 + I) == periodic_argument(2 + I, oo) + assert unbranched_argument(1 + x) == periodic_argument(1 + x, oo) + assert N_equals(unbranched_argument((1 + I)**2), pi/2) + assert N_equals(unbranched_argument((1 - I)**2), -pi/2) + assert N_equals(periodic_argument((1 + I)**2, 3*pi), pi/2) + assert N_equals(periodic_argument((1 - I)**2, 3*pi), -pi/2) + + assert unbranched_argument(principal_branch(x, pi)) == \ + periodic_argument(x, pi) + + assert unbranched_argument(polar_lift(2 + I)) == unbranched_argument(2 + I) + assert periodic_argument(polar_lift(2 + I), 2*pi) == \ + periodic_argument(2 + I, 2*pi) + assert periodic_argument(polar_lift(2 + I), 3*pi) == \ + periodic_argument(2 + I, 3*pi) + assert periodic_argument(polar_lift(2 + I), pi) == \ + periodic_argument(polar_lift(2 + I), pi) + + assert unbranched_argument(polar_lift(1 + I)) == pi/4 + assert periodic_argument(2*p, p) == periodic_argument(p, p) + assert periodic_argument(pi*p, p) == periodic_argument(p, p) + + assert Abs(polar_lift(1 + I)) == Abs(1 + I) + + +@XFAIL +def test_principal_branch_fail(): + # TODO XXX why does abs(x)._eval_evalf() not fall back to global evalf? + from sympy.functions.elementary.complexes import principal_branch + assert N_equals(principal_branch((1 + I)**2, pi/2), 0) + + +def test_principal_branch(): + from sympy.functions.elementary.complexes import (polar_lift, principal_branch) + p = Symbol('p', positive=True) + x = Symbol('x') + neg = Symbol('x', negative=True) + + assert principal_branch(polar_lift(x), p) == principal_branch(x, p) + assert principal_branch(polar_lift(2 + I), p) == principal_branch(2 + I, p) + assert principal_branch(2*x, p) == 2*principal_branch(x, p) + assert principal_branch(1, pi) == exp_polar(0) + assert principal_branch(-1, 2*pi) == exp_polar(I*pi) + assert principal_branch(-1, pi) == exp_polar(0) + assert principal_branch(exp_polar(3*pi*I)*x, 2*pi) == \ + principal_branch(exp_polar(I*pi)*x, 2*pi) + assert principal_branch(neg*exp_polar(pi*I), 2*pi) == neg*exp_polar(-I*pi) + # related to issue #14692 + assert principal_branch(exp_polar(-I*pi/2)/polar_lift(neg), 2*pi) == \ + exp_polar(-I*pi/2)/neg + + assert N_equals(principal_branch((1 + I)**2, 2*pi), 2*I) + assert N_equals(principal_branch((1 + I)**2, 3*pi), 2*I) + assert N_equals(principal_branch((1 + I)**2, 1*pi), 2*I) + + # test argument sanitization + assert principal_branch(x, I).func is principal_branch + assert principal_branch(x, -4).func is principal_branch + assert principal_branch(x, -oo).func is principal_branch + assert principal_branch(x, zoo).func is principal_branch + + +@XFAIL +def test_issue_6167_6151(): + n = pi**1000 + i = int(n) + assert sign(n - i) == 1 + assert abs(n - i) == n - i + x = Symbol('x') + eps = pi**-1500 + big = pi**1000 + one = cos(x)**2 + sin(x)**2 + e = big*one - big + eps + from sympy.simplify.simplify import simplify + assert sign(simplify(e)) == 1 + for xi in (111, 11, 1, Rational(1, 10)): + assert sign(e.subs(x, xi)) == 1 + + +def test_issue_14216(): + from sympy.functions.elementary.complexes import unpolarify + A = MatrixSymbol("A", 2, 2) + assert unpolarify(A[0, 0]) == A[0, 0] + assert unpolarify(A[0, 0]*A[1, 0]) == A[0, 0]*A[1, 0] + + +def test_issue_14238(): + # doesn't cause recursion error + r = Symbol('r', real=True) + assert Abs(r + Piecewise((0, r > 0), (1 - r, True))) + + +def test_issue_22189(): + x = Symbol('x') + for a in (sqrt(7 - 2*x) - 2, 1 - x): + assert Abs(a) - Abs(-a) == 0, a + + +def test_zero_assumptions(): + nr = Symbol('nonreal', real=False, finite=True) + ni = Symbol('nonimaginary', imaginary=False) + # imaginary implies not zero + nzni = Symbol('nonzerononimaginary', zero=False, imaginary=False) + + assert re(nr).is_zero is None + assert im(nr).is_zero is False + + assert re(ni).is_zero is None + assert im(ni).is_zero is None + + assert re(nzni).is_zero is False + assert im(nzni).is_zero is None + + +@_both_exp_pow +def test_issue_15893(): + f = Function('f', real=True) + x = Symbol('x', real=True) + eq = Derivative(Abs(f(x)), f(x)) + assert eq.doit() == sign(f(x)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_exponential.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_exponential.py new file mode 100644 index 0000000000000000000000000000000000000000..ee8c311d01e98d7fd6831ad754e854fae409aa0c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_exponential.py @@ -0,0 +1,810 @@ +from sympy.assumptions.refine import refine +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.function import expand_log +from sympy.core.numbers import (E, Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (adjoint, conjugate, re, sign, transpose) +from sympy.functions.elementary.exponential import (LambertW, exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import (cosh, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin, tan) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.polys.polytools import gcd +from sympy.series.order import O +from sympy.simplify.simplify import simplify +from sympy.core.parameters import global_parameters +from sympy.functions.elementary.exponential import match_real_imag +from sympy.abc import x, y, z +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.testing.pytest import raises, XFAIL, _both_exp_pow + + +@_both_exp_pow +def test_exp_values(): + if global_parameters.exp_is_pow: + assert type(exp(x)) is Pow + else: + assert type(exp(x)) is exp + + k = Symbol('k', integer=True) + + assert exp(nan) is nan + + assert exp(oo) is oo + assert exp(-oo) == 0 + + assert exp(0) == 1 + assert exp(1) == E + assert exp(-1 + x).as_base_exp() == (S.Exp1, x - 1) + assert exp(1 + x).as_base_exp() == (S.Exp1, x + 1) + + assert exp(pi*I/2) == I + assert exp(pi*I) == -1 + assert exp(pi*I*Rational(3, 2)) == -I + assert exp(2*pi*I) == 1 + + assert refine(exp(pi*I*2*k)) == 1 + assert refine(exp(pi*I*2*(k + S.Half))) == -1 + assert refine(exp(pi*I*2*(k + Rational(1, 4)))) == I + assert refine(exp(pi*I*2*(k + Rational(3, 4)))) == -I + + assert exp(log(x)) == x + assert exp(2*log(x)) == x**2 + assert exp(pi*log(x)) == x**pi + + assert exp(17*log(x) + E*log(y)) == x**17 * y**E + + assert exp(x*log(x)) != x**x + assert exp(sin(x)*log(x)) != x + + assert exp(3*log(x) + oo*x) == exp(oo*x) * x**3 + assert exp(4*log(x)*log(y) + 3*log(x)) == x**3 * exp(4*log(x)*log(y)) + + assert exp(-oo, evaluate=False).is_finite is True + assert exp(oo, evaluate=False).is_finite is False + + +@_both_exp_pow +def test_exp_period(): + assert exp(I*pi*Rational(9, 4)) == exp(I*pi/4) + assert exp(I*pi*Rational(46, 18)) == exp(I*pi*Rational(5, 9)) + assert exp(I*pi*Rational(25, 7)) == exp(I*pi*Rational(-3, 7)) + assert exp(I*pi*Rational(-19, 3)) == exp(-I*pi/3) + assert exp(I*pi*Rational(37, 8)) - exp(I*pi*Rational(-11, 8)) == 0 + assert exp(I*pi*Rational(-5, 3)) / exp(I*pi*Rational(11, 5)) * exp(I*pi*Rational(148, 15)) == 1 + + assert exp(2 - I*pi*Rational(17, 5)) == exp(2 + I*pi*Rational(3, 5)) + assert exp(log(3) + I*pi*Rational(29, 9)) == 3 * exp(I*pi*Rational(-7, 9)) + + n = Symbol('n', integer=True) + e = Symbol('e', even=True) + assert exp(e*I*pi) == 1 + assert exp((e + 1)*I*pi) == -1 + assert exp((1 + 4*n)*I*pi/2) == I + assert exp((-1 + 4*n)*I*pi/2) == -I + + +@_both_exp_pow +def test_exp_log(): + x = Symbol("x", real=True) + assert log(exp(x)) == x + assert exp(log(x)) == x + + if not global_parameters.exp_is_pow: + assert log(x).inverse() == exp + assert exp(x).inverse() == log + + y = Symbol("y", polar=True) + assert log(exp_polar(z)) == z + assert exp(log(y)) == y + + +@_both_exp_pow +def test_exp_expand(): + e = exp(log(Rational(2))*(1 + x) - log(Rational(2))*x) + assert e.expand() == 2 + assert exp(x + y) != exp(x)*exp(y) + assert exp(x + y).expand() == exp(x)*exp(y) + + +@_both_exp_pow +def test_exp__as_base_exp(): + assert exp(x).as_base_exp() == (E, x) + assert exp(2*x).as_base_exp() == (E, 2*x) + assert exp(x*y).as_base_exp() == (E, x*y) + assert exp(-x).as_base_exp() == (E, -x) + + # Pow( *expr.as_base_exp() ) == expr invariant should hold + assert E**x == exp(x) + assert E**(2*x) == exp(2*x) + assert E**(x*y) == exp(x*y) + + assert exp(x).base is S.Exp1 + assert exp(x).exp == x + + +@_both_exp_pow +def test_exp_infinity(): + assert exp(I*y) != nan + assert refine(exp(I*oo)) is nan + assert refine(exp(-I*oo)) is nan + assert exp(y*I*oo) != nan + assert exp(zoo) is nan + x = Symbol('x', extended_real=True, finite=False) + assert exp(x).is_complex is None + + +@_both_exp_pow +def test_exp_subs(): + x = Symbol('x') + e = (exp(3*log(x), evaluate=False)) # evaluates to x**3 + assert e.subs(x**3, y**3) == e + assert e.subs(x**2, 5) == e + assert (x**3).subs(x**2, y) != y**Rational(3, 2) + assert exp(exp(x) + exp(x**2)).subs(exp(exp(x)), y) == y * exp(exp(x**2)) + assert exp(x).subs(E, y) == y**x + x = symbols('x', real=True) + assert exp(5*x).subs(exp(7*x), y) == y**Rational(5, 7) + assert exp(2*x + 7).subs(exp(3*x), y) == y**Rational(2, 3) * exp(7) + x = symbols('x', positive=True) + assert exp(3*log(x)).subs(x**2, y) == y**Rational(3, 2) + # differentiate between E and exp + assert exp(exp(x + E)).subs(exp, 3) == 3**(3**(x + E)) + assert exp(exp(x + E)).subs(exp, sin) == sin(sin(x + E)) + assert exp(exp(x + E)).subs(E, 3) == 3**(3**(x + 3)) + assert exp(3).subs(E, sin) == sin(3) + + +def test_exp_adjoint(): + x = Symbol('x', commutative=False) + assert adjoint(exp(x)) == exp(adjoint(x)) + + +def test_exp_conjugate(): + assert conjugate(exp(x)) == exp(conjugate(x)) + + +@_both_exp_pow +def test_exp_transpose(): + assert transpose(exp(x)) == exp(transpose(x)) + + +@_both_exp_pow +def test_exp_rewrite(): + assert exp(x).rewrite(sin) == sinh(x) + cosh(x) + assert exp(x*I).rewrite(cos) == cos(x) + I*sin(x) + assert exp(1).rewrite(cos) == sinh(1) + cosh(1) + assert exp(1).rewrite(sin) == sinh(1) + cosh(1) + assert exp(1).rewrite(sin) == sinh(1) + cosh(1) + assert exp(x).rewrite(tanh) == (1 + tanh(x/2))/(1 - tanh(x/2)) + assert exp(pi*I/4).rewrite(sqrt) == sqrt(2)/2 + sqrt(2)*I/2 + assert exp(pi*I/3).rewrite(sqrt) == S.Half + sqrt(3)*I/2 + if not global_parameters.exp_is_pow: + assert exp(x*log(y)).rewrite(Pow) == y**x + assert exp(log(x)*log(y)).rewrite(Pow) in [x**log(y), y**log(x)] + assert exp(log(log(x))*y).rewrite(Pow) == log(x)**y + + n = Symbol('n', integer=True) + + assert Sum((exp(pi*I/2)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == Rational(4, 5) + I*2/5 + assert Sum((exp(pi*I/4)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == 1/(1 - sqrt(2)*(1 + I)/4) + assert (Sum((exp(pi*I/3)/2)**n, (n, 0, oo)).rewrite(sqrt).doit().cancel() + == 4*I/(sqrt(3) + 3*I)) + + +@_both_exp_pow +def test_exp_leading_term(): + assert exp(x).as_leading_term(x) == 1 + assert exp(2 + x).as_leading_term(x) == exp(2) + assert exp((2*x + 3) / (x+1)).as_leading_term(x) == exp(3) + + # The following tests are commented, since now SymPy returns the + # original function when the leading term in the series expansion does + # not exist. + # raises(NotImplementedError, lambda: exp(1/x).as_leading_term(x)) + # raises(NotImplementedError, lambda: exp((x + 1) / x**2).as_leading_term(x)) + # raises(NotImplementedError, lambda: exp(x + 1/x).as_leading_term(x)) + + +@_both_exp_pow +def test_exp_taylor_term(): + x = symbols('x') + assert exp(x).taylor_term(1, x) == x + assert exp(x).taylor_term(3, x) == x**3/6 + assert exp(x).taylor_term(4, x) == x**4/24 + assert exp(x).taylor_term(-1, x) is S.Zero + + +def test_exp_MatrixSymbol(): + A = MatrixSymbol("A", 2, 2) + assert exp(A).has(exp) + + +def test_exp_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: exp(x).fdiff(2)) + + +def test_log_values(): + assert log(nan) is nan + + assert log(oo) is oo + assert log(-oo) is oo + + assert log(zoo) is zoo + assert log(-zoo) is zoo + + assert log(0) is zoo + + assert log(1) == 0 + assert log(-1) == I*pi + + assert log(E) == 1 + assert log(-E).expand() == 1 + I*pi + + assert unchanged(log, pi) + assert log(-pi).expand() == log(pi) + I*pi + + assert unchanged(log, 17) + assert log(-17) == log(17) + I*pi + + assert log(I) == I*pi/2 + assert log(-I) == -I*pi/2 + + assert log(17*I) == I*pi/2 + log(17) + assert log(-17*I).expand() == -I*pi/2 + log(17) + + assert log(oo*I) is oo + assert log(-oo*I) is oo + assert log(0, 2) is zoo + assert log(0, 5) is zoo + + assert exp(-log(3))**(-1) == 3 + + assert log(S.Half) == -log(2) + assert log(2*3).func is log + assert log(2*3**2).func is log + + +def test_match_real_imag(): + x, y = symbols('x,y', real=True) + i = Symbol('i', imaginary=True) + assert match_real_imag(S.One) == (1, 0) + assert match_real_imag(I) == (0, 1) + assert match_real_imag(3 - 5*I) == (3, -5) + assert match_real_imag(-sqrt(3) + S.Half*I) == (-sqrt(3), S.Half) + assert match_real_imag(x + y*I) == (x, y) + assert match_real_imag(x*I + y*I) == (0, x + y) + assert match_real_imag((x + y)*I) == (0, x + y) + assert match_real_imag(Rational(-2, 3)*i*I) == (None, None) + assert match_real_imag(1 - 2*i) == (None, None) + assert match_real_imag(sqrt(2)*(3 - 5*I)) == (None, None) + + +def test_log_exact(): + # check for pi/2, pi/3, pi/4, pi/6, pi/8, pi/12; pi/5, pi/10: + for n in range(-23, 24): + if gcd(n, 24) != 1: + assert log(exp(n*I*pi/24).rewrite(sqrt)) == n*I*pi/24 + for n in range(-9, 10): + assert log(exp(n*I*pi/10).rewrite(sqrt)) == n*I*pi/10 + + assert log(S.Half - I*sqrt(3)/2) == -I*pi/3 + assert log(Rational(-1, 2) + I*sqrt(3)/2) == I*pi*Rational(2, 3) + assert log(-sqrt(2)/2 - I*sqrt(2)/2) == -I*pi*Rational(3, 4) + assert log(-sqrt(3)/2 - I*S.Half) == -I*pi*Rational(5, 6) + + assert log(Rational(-1, 4) + sqrt(5)/4 - I*sqrt(sqrt(5)/8 + Rational(5, 8))) == -I*pi*Rational(2, 5) + assert log(sqrt(Rational(5, 8) - sqrt(5)/8) + I*(Rational(1, 4) + sqrt(5)/4)) == I*pi*Rational(3, 10) + assert log(-sqrt(sqrt(2)/4 + S.Half) + I*sqrt(S.Half - sqrt(2)/4)) == I*pi*Rational(7, 8) + assert log(-sqrt(6)/4 - sqrt(2)/4 + I*(-sqrt(6)/4 + sqrt(2)/4)) == -I*pi*Rational(11, 12) + + assert log(-1 + I*sqrt(3)) == log(2) + I*pi*Rational(2, 3) + assert log(5 + 5*I) == log(5*sqrt(2)) + I*pi/4 + assert log(sqrt(-12)) == log(2*sqrt(3)) + I*pi/2 + assert log(-sqrt(6) + sqrt(2) - I*sqrt(6) - I*sqrt(2)) == log(4) - I*pi*Rational(7, 12) + assert log(-sqrt(6-3*sqrt(2)) - I*sqrt(6+3*sqrt(2))) == log(2*sqrt(3)) - I*pi*Rational(5, 8) + assert log(1 + I*sqrt(2-sqrt(2))/sqrt(2+sqrt(2))) == log(2/sqrt(sqrt(2) + 2)) + I*pi/8 + assert log(cos(pi*Rational(7, 12)) + I*sin(pi*Rational(7, 12))) == I*pi*Rational(7, 12) + assert log(cos(pi*Rational(6, 5)) + I*sin(pi*Rational(6, 5))) == I*pi*Rational(-4, 5) + + assert log(5*(1 + I)/sqrt(2)) == log(5) + I*pi/4 + assert log(sqrt(2)*(-sqrt(3) + 1 - sqrt(3)*I - I)) == log(4) - I*pi*Rational(7, 12) + assert log(-sqrt(2)*(1 - I*sqrt(3))) == log(2*sqrt(2)) + I*pi*Rational(2, 3) + assert log(sqrt(3)*I*(-sqrt(6 - 3*sqrt(2)) - I*sqrt(3*sqrt(2) + 6))) == log(6) - I*pi/8 + + zero = (1 + sqrt(2))**2 - 3 - 2*sqrt(2) + assert log(zero - I*sqrt(3)) == log(sqrt(3)) - I*pi/2 + assert unchanged(log, zero + I*zero) or log(zero + zero*I) is zoo + + # bail quickly if no obvious simplification is possible: + assert unchanged(log, (sqrt(2)-1/sqrt(sqrt(3)+I))**1000) + # beware of non-real coefficients + assert unchanged(log, sqrt(2-sqrt(5))*(1 + I)) + + +def test_log_base(): + assert log(1, 2) == 0 + assert log(2, 2) == 1 + assert log(3, 2) == log(3)/log(2) + assert log(6, 2) == 1 + log(3)/log(2) + assert log(6, 3) == 1 + log(2)/log(3) + assert log(2**3, 2) == 3 + assert log(3**3, 3) == 3 + assert log(5, 1) is zoo + assert log(1, 1) is nan + assert log(Rational(2, 3), 10) == log(Rational(2, 3))/log(10) + assert log(Rational(2, 3), Rational(1, 3)) == -log(2)/log(3) + 1 + assert log(Rational(2, 3), Rational(2, 5)) == \ + log(Rational(2, 3))/log(Rational(2, 5)) + # issue 17148 + assert log(Rational(8, 3), 2) == -log(3)/log(2) + 3 + + +def test_log_symbolic(): + assert log(x, exp(1)) == log(x) + assert log(exp(x)) != x + + assert log(x, exp(1)) == log(x) + assert log(x*y) != log(x) + log(y) + assert log(x/y).expand() != log(x) - log(y) + assert log(x/y).expand(force=True) == log(x) - log(y) + assert log(x**y).expand() != y*log(x) + assert log(x**y).expand(force=True) == y*log(x) + + assert log(x, 2) == log(x)/log(2) + assert log(E, 2) == 1/log(2) + + p, q = symbols('p,q', positive=True) + r = Symbol('r', real=True) + + assert log(p**2) != 2*log(p) + assert log(p**2).expand() == 2*log(p) + assert log(x**2).expand() != 2*log(x) + assert log(p**q) != q*log(p) + assert log(exp(p)) == p + assert log(p*q) != log(p) + log(q) + assert log(p*q).expand() == log(p) + log(q) + + assert log(-sqrt(3)) == log(sqrt(3)) + I*pi + assert log(-exp(p)) != p + I*pi + assert log(-exp(x)).expand() != x + I*pi + assert log(-exp(r)).expand() == r + I*pi + + assert log(x**y) != y*log(x) + + assert (log(x**-5)**-1).expand() != -1/log(x)/5 + assert (log(p**-5)**-1).expand() == -1/log(p)/5 + assert log(-x).func is log and log(-x).args[0] == -x + assert log(-p).func is log and log(-p).args[0] == -p + + +def test_log_exp(): + assert log(exp(4*I*pi)) == 0 # exp evaluates + assert log(exp(-5*I*pi)) == I*pi # exp evaluates + assert log(exp(I*pi*Rational(19, 4))) == I*pi*Rational(3, 4) + assert log(exp(I*pi*Rational(25, 7))) == I*pi*Rational(-3, 7) + assert log(exp(-5*I)) == -5*I + 2*I*pi + + +@_both_exp_pow +def test_exp_assumptions(): + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + for e in exp, exp_polar: + assert e(x).is_real is None + assert e(x).is_imaginary is None + assert e(i).is_real is None + assert e(i).is_imaginary is None + assert e(r).is_real is True + assert e(r).is_imaginary is False + assert e(re(x)).is_extended_real is True + assert e(re(x)).is_imaginary is False + + assert Pow(E, I*pi, evaluate=False).is_imaginary == False + assert Pow(E, 2*I*pi, evaluate=False).is_imaginary == False + assert Pow(E, I*pi/2, evaluate=False).is_imaginary == True + assert Pow(E, I*pi/3, evaluate=False).is_imaginary is None + + assert exp(0, evaluate=False).is_algebraic + + a = Symbol('a', algebraic=True) + an = Symbol('an', algebraic=True, nonzero=True) + r = Symbol('r', rational=True) + rn = Symbol('rn', rational=True, nonzero=True) + assert exp(a).is_algebraic is None + assert exp(an).is_algebraic is False + assert exp(pi*r).is_algebraic is None + assert exp(pi*rn).is_algebraic is False + + assert exp(0, evaluate=False).is_algebraic is True + assert exp(I*pi/3, evaluate=False).is_algebraic is True + assert exp(I*pi*r, evaluate=False).is_algebraic is True + + +@_both_exp_pow +def test_exp_AccumBounds(): + assert exp(AccumBounds(1, 2)) == AccumBounds(E, E**2) + + +def test_log_assumptions(): + p = symbols('p', positive=True) + n = symbols('n', negative=True) + z = symbols('z', zero=True) + x = symbols('x', infinite=True, extended_positive=True) + + assert log(z).is_positive is False + assert log(x).is_extended_positive is True + assert log(2) > 0 + assert log(1, evaluate=False).is_zero + assert log(1 + z).is_zero + assert log(p).is_zero is None + assert log(n).is_zero is False + assert log(0.5).is_negative is True + assert log(exp(p) + 1).is_positive + + assert log(1, evaluate=False).is_algebraic + assert log(42, evaluate=False).is_algebraic is False + + assert log(1 + z).is_rational + + +def test_log_hashing(): + assert x != log(log(x)) + assert hash(x) != hash(log(log(x))) + assert log(x) != log(log(log(x))) + + e = 1/log(log(x) + log(log(x))) + assert e.base.func is log + e = 1/log(log(x) + log(log(log(x)))) + assert e.base.func is log + + e = log(log(x)) + assert e.func is log + assert x.func is not log + assert hash(log(log(x))) != hash(x) + assert e != x + + +def test_log_sign(): + assert sign(log(2)) == 1 + + +def test_log_expand_complex(): + assert log(1 + I).expand(complex=True) == log(2)/2 + I*pi/4 + assert log(1 - sqrt(2)).expand(complex=True) == log(sqrt(2) - 1) + I*pi + + +def test_log_apply_evalf(): + value = (log(3)/log(2) - 1).evalf() + assert value.epsilon_eq(Float("0.58496250072115618145373")) + + +def test_log_leading_term(): + p = Symbol('p') + + # Test for STEP 3 + assert log(1 + x + x**2).as_leading_term(x, cdir=1) == x + # Test for STEP 4 + assert log(2*x).as_leading_term(x, cdir=1) == log(x) + log(2) + assert log(2*x).as_leading_term(x, cdir=-1) == log(x) + log(2) + assert log(-2*x).as_leading_term(x, cdir=1, logx=p) == p + log(2) + I*pi + assert log(-2*x).as_leading_term(x, cdir=-1, logx=p) == p + log(2) - I*pi + # Test for STEP 5 + assert log(-2*x + (3 - I)*x**2).as_leading_term(x, cdir=1) == log(x) + log(2) - I*pi + assert log(-2*x + (3 - I)*x**2).as_leading_term(x, cdir=-1) == log(x) + log(2) - I*pi + assert log(2*x + (3 - I)*x**2).as_leading_term(x, cdir=1) == log(x) + log(2) + assert log(2*x + (3 - I)*x**2).as_leading_term(x, cdir=-1) == log(x) + log(2) - 2*I*pi + assert log(-1 + x - I*x**2 + I*x**3).as_leading_term(x, cdir=1) == -I*pi + assert log(-1 + x - I*x**2 + I*x**3).as_leading_term(x, cdir=-1) == -I*pi + assert log(-1/(1 - x)).as_leading_term(x, cdir=1) == I*pi + assert log(-1/(1 - x)).as_leading_term(x, cdir=-1) == I*pi + + +def test_log_nseries(): + p = Symbol('p') + assert log(1/x)._eval_nseries(x, 4, logx=-p, cdir=1) == p + assert log(1/x)._eval_nseries(x, 4, logx=-p, cdir=-1) == p + 2*I*pi + assert log(x - 1)._eval_nseries(x, 4, None, I) == I*pi - x - x**2/2 - x**3/3 + O(x**4) + assert log(x - 1)._eval_nseries(x, 4, None, -I) == -I*pi - x - x**2/2 - x**3/3 + O(x**4) + assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x + x**2/2 + O(x**3) + assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == -I*pi - I*x + x**2/2 + O(x**3) + assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x**2 + O(x**3) + assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == I*pi - I*x**2 + O(x**3) + assert log(2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, 1) == log(2) + log(x) + \ + x*(S(3)/2 - I/2) + x**2*(-1 + 3*I/4) + O(x**3) + assert log(2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, -1) == -2*I*pi + log(2) + \ + log(x) - x*(-S(3)/2 + I/2) + x**2*(-1 + 3*I/4) + O(x**3) + assert log(-2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, 1) == -I*pi + log(2) + log(x) + \ + x*(-S(3)/2 + I/2) + x**2*(-1 + 3*I/4) + O(x**3) + assert log(-2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, -1) == -I*pi + log(2) + log(x) - \ + x*(S(3)/2 - I/2) + x**2*(-1 + 3*I/4) + O(x**3) + assert log(sqrt(-I*x**2 - 3)*sqrt(-I*x**2 - 1) - 2)._eval_nseries(x, 3, None, 1) == -I*pi + \ + log(sqrt(3) + 2) + 2*sqrt(3)*I*x**2/(3*sqrt(3) + 6) + O(x**3) + assert log(-1/(1 - x))._eval_nseries(x, 3, None, 1) == I*pi + x + x**2/2 + O(x**3) + assert log(-1/(1 - x))._eval_nseries(x, 3, None, -1) == I*pi + x + x**2/2 + O(x**3) + + +def test_log_series(): + # Note Series at infinities other than oo/-oo were introduced as a part of + # pull request 23798. Refer https://github.com/sympy/sympy/pull/23798 for + # more information. + expr1 = log(1 + x) + expr2 = log(x + sqrt(x**2 + 1)) + + assert expr1.series(x, x0=I*oo, n=4) == 1/(3*x**3) - 1/(2*x**2) + 1/x + \ + I*pi/2 - log(I/x) + O(x**(-4), (x, oo*I)) + assert expr1.series(x, x0=-I*oo, n=4) == 1/(3*x**3) - 1/(2*x**2) + 1/x - \ + I*pi/2 - log(-I/x) + O(x**(-4), (x, -oo*I)) + assert expr2.series(x, x0=I*oo, n=4) == 1/(4*x**2) + I*pi/2 + log(2) - \ + log(I/x) + O(x**(-4), (x, oo*I)) + assert expr2.series(x, x0=-I*oo, n=4) == -1/(4*x**2) - I*pi/2 - log(2) + \ + log(-I/x) + O(x**(-4), (x, -oo*I)) + + +def test_log_expand(): + w = Symbol("w", positive=True) + e = log(w**(log(5)/log(3))) + assert e.expand() == log(5)/log(3) * log(w) + x, y, z = symbols('x,y,z', positive=True) + assert log(x*(y + z)).expand(mul=False) == log(x) + log(y + z) + assert log(log(x**2)*log(y*z)).expand() in [log(2*log(x)*log(y) + + 2*log(x)*log(z)), log(log(x)*log(z) + log(y)*log(x)) + log(2), + log((log(y) + log(z))*log(x)) + log(2)] + assert log(x**log(x**2)).expand(deep=False) == log(x)*log(x**2) + assert log(x**log(x**2)).expand() == 2*log(x)**2 + x, y = symbols('x,y') + assert log(x*y).expand(force=True) == log(x) + log(y) + assert log(x**y).expand(force=True) == y*log(x) + assert log(exp(x)).expand(force=True) == x + + # there's generally no need to expand out logs since this requires + # factoring and if simplification is sought, it's cheaper to put + # logs together than it is to take them apart. + assert log(2*3**2).expand() != 2*log(3) + log(2) + + +@XFAIL +def test_log_expand_fail(): + x, y, z = symbols('x,y,z', positive=True) + assert (log(x*(y + z))*(x + y)).expand(mul=True, log=True) == y*log( + x) + y*log(y + z) + z*log(x) + z*log(y + z) + + +def test_log_simplify(): + x = Symbol("x", positive=True) + assert log(x**2).expand() == 2*log(x) + assert expand_log(log(x**(2 + log(2)))) == (2 + log(2))*log(x) + + z = Symbol('z') + assert log(sqrt(z)).expand() == log(z)/2 + assert expand_log(log(z**(log(2) - 1))) == (log(2) - 1)*log(z) + assert log(z**(-1)).expand() != -log(z) + assert log(z**(x/(x+1))).expand() == x*log(z)/(x + 1) + + +def test_log_AccumBounds(): + assert log(AccumBounds(1, E)) == AccumBounds(0, 1) + assert log(AccumBounds(0, E)) == AccumBounds(-oo, 1) + assert log(AccumBounds(-1, E)) == S.NaN + assert log(AccumBounds(0, oo)) == AccumBounds(-oo, oo) + assert log(AccumBounds(-oo, 0)) == S.NaN + assert log(AccumBounds(-oo, oo)) == S.NaN + + +@_both_exp_pow +def test_lambertw(): + k = Symbol('k') + + assert LambertW(x, 0) == LambertW(x) + assert LambertW(x, 0, evaluate=False) != LambertW(x) + assert LambertW(0) == 0 + assert LambertW(E) == 1 + assert LambertW(-1/E) == -1 + assert LambertW(-log(2)/2) == -log(2) + assert LambertW(oo) is oo + assert LambertW(0, 1) is -oo + assert LambertW(0, 42) is -oo + assert LambertW(-pi/2, -1) == -I*pi/2 + assert LambertW(-1/E, -1) == -1 + assert LambertW(-2*exp(-2), -1) == -2 + assert LambertW(2*log(2)) == log(2) + assert LambertW(-pi/2) == I*pi/2 + assert LambertW(exp(1 + E)) == E + + assert LambertW(x**2).diff(x) == 2*LambertW(x**2)/x/(1 + LambertW(x**2)) + assert LambertW(x, k).diff(x) == LambertW(x, k)/x/(1 + LambertW(x, k)) + + assert LambertW(sqrt(2)).evalf(30).epsilon_eq( + Float("0.701338383413663009202120278965", 30), 1e-29) + assert re(LambertW(2, -1)).evalf().epsilon_eq(Float("-0.834310366631110")) + + assert LambertW(-1).is_real is False # issue 5215 + assert LambertW(2, evaluate=False).is_real + p = Symbol('p', positive=True) + assert LambertW(p, evaluate=False).is_real + assert LambertW(p - 1, evaluate=False).is_real is None + assert LambertW(-p - 2/S.Exp1, evaluate=False).is_real is False + assert LambertW(S.Half, -1, evaluate=False).is_real is False + assert LambertW(Rational(-1, 10), -1, evaluate=False).is_real + assert LambertW(-10, -1, evaluate=False).is_real is False + assert LambertW(-2, 2, evaluate=False).is_real is False + + assert LambertW(0, evaluate=False).is_algebraic + na = Symbol('na', nonzero=True, algebraic=True) + assert LambertW(na).is_algebraic is False + assert LambertW(p).is_zero is False + n = Symbol('n', negative=True) + assert LambertW(n).is_zero is False + + +def test_issue_5673(): + e = LambertW(-1) + assert e.is_comparable is False + assert e.is_positive is not True + e2 = 1 - 1/(1 - exp(-1000)) + assert e2.is_positive is not True + e3 = -2 + exp(exp(LambertW(log(2)))*LambertW(log(2))) + assert e3.is_nonzero is not True + + +def test_log_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: log(x).fdiff(2)) + + +def test_log_taylor_term(): + x = symbols('x') + assert log(x).taylor_term(0, x) == x + assert log(x).taylor_term(1, x) == -x**2/2 + assert log(x).taylor_term(4, x) == x**5/5 + assert log(x).taylor_term(-1, x) is S.Zero + + +def test_exp_expand_NC(): + A, B, C = symbols('A,B,C', commutative=False) + + assert exp(A + B).expand() == exp(A + B) + assert exp(A + B + C).expand() == exp(A + B + C) + assert exp(x + y).expand() == exp(x)*exp(y) + assert exp(x + y + z).expand() == exp(x)*exp(y)*exp(z) + + +@_both_exp_pow +def test_as_numer_denom(): + n = symbols('n', negative=True) + assert exp(x).as_numer_denom() == (exp(x), 1) + assert exp(-x).as_numer_denom() == (1, exp(x)) + assert exp(-2*x).as_numer_denom() == (1, exp(2*x)) + assert exp(-2).as_numer_denom() == (1, exp(2)) + assert exp(n).as_numer_denom() == (1, exp(-n)) + assert exp(-n).as_numer_denom() == (exp(-n), 1) + assert exp(-I*x).as_numer_denom() == (1, exp(I*x)) + assert exp(-I*n).as_numer_denom() == (1, exp(I*n)) + assert exp(-n).as_numer_denom() == (exp(-n), 1) + # Check noncommutativity + a = symbols('a', commutative=False) + assert exp(-a).as_numer_denom() == (exp(-a), 1) + + +@_both_exp_pow +def test_polar(): + x, y = symbols('x y', polar=True) + + assert abs(exp_polar(I*4)) == 1 + assert abs(exp_polar(0)) == 1 + assert abs(exp_polar(2 + 3*I)) == exp(2) + assert exp_polar(I*10).n() == exp_polar(I*10) + + assert log(exp_polar(z)) == z + assert log(x*y).expand() == log(x) + log(y) + assert log(x**z).expand() == z*log(x) + + assert exp_polar(3).exp == 3 + + # Compare exp(1.0*pi*I). + assert (exp_polar(1.0*pi*I).n(n=5)).as_real_imag()[1] >= 0 + + assert exp_polar(0).is_rational is True # issue 8008 + + +def test_exp_summation(): + w = symbols("w") + m, n, i, j = symbols("m n i j") + expr = exp(Sum(w*i, (i, 0, n), (j, 0, m))) + assert expr.expand() == Product(exp(w*i), (i, 0, n), (j, 0, m)) + + +def test_log_product(): + from sympy.abc import n, m + + i, j = symbols('i,j', positive=True, integer=True) + x, y = symbols('x,y', positive=True) + z = symbols('z', real=True) + w = symbols('w') + + expr = log(Product(x**i, (i, 1, n))) + assert simplify(expr) == expr + assert expr.expand() == Sum(i*log(x), (i, 1, n)) + expr = log(Product(x**i*y**j, (i, 1, n), (j, 1, m))) + assert simplify(expr) == expr + assert expr.expand() == Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m)) + + expr = log(Product(-2, (n, 0, 4))) + assert simplify(expr) == expr + assert expr.expand() == expr + assert expr.expand(force=True) == Sum(log(-2), (n, 0, 4)) + + expr = log(Product(exp(z*i), (i, 0, n))) + assert expr.expand() == Sum(z*i, (i, 0, n)) + + expr = log(Product(exp(w*i), (i, 0, n))) + assert expr.expand() == expr + assert expr.expand(force=True) == Sum(w*i, (i, 0, n)) + + expr = log(Product(i**2*abs(j), (i, 1, n), (j, 1, m))) + assert expr.expand() == Sum(2*log(i) + log(j), (i, 1, n), (j, 1, m)) + + +@XFAIL +def test_log_product_simplify_to_sum(): + from sympy.abc import n, m + i, j = symbols('i,j', positive=True, integer=True) + x, y = symbols('x,y', positive=True) + assert simplify(log(Product(x**i, (i, 1, n)))) == Sum(i*log(x), (i, 1, n)) + assert simplify(log(Product(x**i*y**j, (i, 1, n), (j, 1, m)))) == \ + Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m)) + + +def test_issue_8866(): + assert simplify(log(x, 10, evaluate=False)) == simplify(log(x, 10)) + assert expand_log(log(x, 10, evaluate=False)) == expand_log(log(x, 10)) + + y = Symbol('y', positive=True) + l1 = log(exp(y), exp(10)) + b1 = log(exp(y), exp(5)) + l2 = log(exp(y), exp(10), evaluate=False) + b2 = log(exp(y), exp(5), evaluate=False) + assert simplify(log(l1, b1)) == simplify(log(l2, b2)) + assert expand_log(log(l1, b1)) == expand_log(log(l2, b2)) + + +def test_log_expand_factor(): + assert (log(18)/log(3) - 2).expand(factor=True) == log(2)/log(3) + assert (log(12)/log(2)).expand(factor=True) == log(3)/log(2) + 2 + assert (log(15)/log(3)).expand(factor=True) == 1 + log(5)/log(3) + assert (log(2)/(-log(12) + log(24))).expand(factor=True) == 1 + + assert expand_log(log(12), factor=True) == log(3) + 2*log(2) + assert expand_log(log(21)/log(7), factor=False) == log(3)/log(7) + 1 + assert expand_log(log(45)/log(5) + log(20), factor=False) == \ + 1 + 2*log(3)/log(5) + log(20) + assert expand_log(log(45)/log(5) + log(26), factor=True) == \ + log(2) + log(13) + (log(5) + 2*log(3))/log(5) + + +def test_issue_9116(): + n = Symbol('n', positive=True, integer=True) + assert log(n).is_nonnegative is True + + +def test_issue_18473(): + assert exp(x*log(cos(1/x))).as_leading_term(x) == S.NaN + assert exp(x*log(tan(1/x))).as_leading_term(x) == S.NaN + assert log(cos(1/x)).as_leading_term(x) == S.NaN + assert log(tan(1/x)).as_leading_term(x) == S.NaN + assert log(cos(1/x) + 2).as_leading_term(x) == AccumBounds(0, log(3)) + assert exp(x*log(cos(1/x) + 2)).as_leading_term(x) == 1 + assert log(cos(1/x) - 2).as_leading_term(x) == S.NaN + assert exp(x*log(cos(1/x) - 2)).as_leading_term(x) == S.NaN + assert log(cos(1/x) + 1).as_leading_term(x) == AccumBounds(-oo, log(2)) + assert exp(x*log(cos(1/x) + 1)).as_leading_term(x) == AccumBounds(0, 1) + assert log(sin(1/x)**2).as_leading_term(x) == AccumBounds(-oo, 0) + assert exp(x*log(sin(1/x)**2)).as_leading_term(x) == AccumBounds(0, 1) + assert log(tan(1/x)**2).as_leading_term(x) == AccumBounds(-oo, oo) + assert exp(2*x*(log(tan(1/x)**2))).as_leading_term(x) == AccumBounds(0, oo) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_hyperbolic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_hyperbolic.py new file mode 100644 index 0000000000000000000000000000000000000000..1ad9f1d51598b9d605b0472e254c5a710d4ed4f5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_hyperbolic.py @@ -0,0 +1,1553 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.core.function import (expand_mul, expand_trig) +from sympy.core.numbers import (E, I, Integer, Rational, nan, oo, pi, zoo) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (acosh, acoth, acsch, asech, asinh, atanh, cosh, coth, csch, sech, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, asin, cos, cot, sec, sin, tan) +from sympy.series.order import O + +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError, PoleError +from sympy.testing.pytest import raises + + +def test_sinh(): + x, y = symbols('x,y') + + k = Symbol('k', integer=True) + + assert sinh(nan) is nan + assert sinh(zoo) is nan + + assert sinh(oo) is oo + assert sinh(-oo) is -oo + + assert sinh(0) == 0 + + assert unchanged(sinh, 1) + assert sinh(-1) == -sinh(1) + + assert unchanged(sinh, x) + assert sinh(-x) == -sinh(x) + + assert unchanged(sinh, pi) + assert sinh(-pi) == -sinh(pi) + + assert unchanged(sinh, 2**1024 * E) + assert sinh(-2**1024 * E) == -sinh(2**1024 * E) + + assert sinh(pi*I) == 0 + assert sinh(-pi*I) == 0 + assert sinh(2*pi*I) == 0 + assert sinh(-2*pi*I) == 0 + assert sinh(-3*10**73*pi*I) == 0 + assert sinh(7*10**103*pi*I) == 0 + + assert sinh(pi*I/2) == I + assert sinh(-pi*I/2) == -I + assert sinh(pi*I*Rational(5, 2)) == I + assert sinh(pi*I*Rational(7, 2)) == -I + + assert sinh(pi*I/3) == S.Half*sqrt(3)*I + assert sinh(pi*I*Rational(-2, 3)) == Rational(-1, 2)*sqrt(3)*I + + assert sinh(pi*I/4) == S.Half*sqrt(2)*I + assert sinh(-pi*I/4) == Rational(-1, 2)*sqrt(2)*I + assert sinh(pi*I*Rational(17, 4)) == S.Half*sqrt(2)*I + assert sinh(pi*I*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2)*I + + assert sinh(pi*I/6) == S.Half*I + assert sinh(-pi*I/6) == Rational(-1, 2)*I + assert sinh(pi*I*Rational(7, 6)) == Rational(-1, 2)*I + assert sinh(pi*I*Rational(-5, 6)) == Rational(-1, 2)*I + + assert sinh(pi*I/105) == sin(pi/105)*I + assert sinh(-pi*I/105) == -sin(pi/105)*I + + assert unchanged(sinh, 2 + 3*I) + + assert sinh(x*I) == sin(x)*I + + assert sinh(k*pi*I) == 0 + assert sinh(17*k*pi*I) == 0 + + assert sinh(k*pi*I/2) == sin(k*pi/2)*I + + assert sinh(x).as_real_imag(deep=False) == (cos(im(x))*sinh(re(x)), + sin(im(x))*cosh(re(x))) + x = Symbol('x', extended_real=True) + assert sinh(x).as_real_imag(deep=False) == (sinh(x), 0) + + x = Symbol('x', real=True) + assert sinh(I*x).is_finite is True + assert sinh(x).is_real is True + assert sinh(I).is_real is False + p = Symbol('p', positive=True) + assert sinh(p).is_zero is False + assert sinh(0, evaluate=False).is_zero is True + assert sinh(2*pi*I, evaluate=False).is_zero is True + + +def test_sinh_series(): + x = Symbol('x') + assert sinh(x).series(x, 0, 10) == \ + x + x**3/6 + x**5/120 + x**7/5040 + x**9/362880 + O(x**10) + + +def test_sinh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: sinh(x).fdiff(2)) + + +def test_cosh(): + x, y = symbols('x,y') + + k = Symbol('k', integer=True) + + assert cosh(nan) is nan + assert cosh(zoo) is nan + + assert cosh(oo) is oo + assert cosh(-oo) is oo + + assert cosh(0) == 1 + + assert unchanged(cosh, 1) + assert cosh(-1) == cosh(1) + + assert unchanged(cosh, x) + assert cosh(-x) == cosh(x) + + assert cosh(pi*I) == cos(pi) + assert cosh(-pi*I) == cos(pi) + + assert unchanged(cosh, 2**1024 * E) + assert cosh(-2**1024 * E) == cosh(2**1024 * E) + + assert cosh(pi*I/2) == 0 + assert cosh(-pi*I/2) == 0 + assert cosh((-3*10**73 + 1)*pi*I/2) == 0 + assert cosh((7*10**103 + 1)*pi*I/2) == 0 + + assert cosh(pi*I) == -1 + assert cosh(-pi*I) == -1 + assert cosh(5*pi*I) == -1 + assert cosh(8*pi*I) == 1 + + assert cosh(pi*I/3) == S.Half + assert cosh(pi*I*Rational(-2, 3)) == Rational(-1, 2) + + assert cosh(pi*I/4) == S.Half*sqrt(2) + assert cosh(-pi*I/4) == S.Half*sqrt(2) + assert cosh(pi*I*Rational(11, 4)) == Rational(-1, 2)*sqrt(2) + assert cosh(pi*I*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2) + + assert cosh(pi*I/6) == S.Half*sqrt(3) + assert cosh(-pi*I/6) == S.Half*sqrt(3) + assert cosh(pi*I*Rational(7, 6)) == Rational(-1, 2)*sqrt(3) + assert cosh(pi*I*Rational(-5, 6)) == Rational(-1, 2)*sqrt(3) + + assert cosh(pi*I/105) == cos(pi/105) + assert cosh(-pi*I/105) == cos(pi/105) + + assert unchanged(cosh, 2 + 3*I) + + assert cosh(x*I) == cos(x) + + assert cosh(k*pi*I) == cos(k*pi) + assert cosh(17*k*pi*I) == cos(17*k*pi) + + assert unchanged(cosh, k*pi) + + assert cosh(x).as_real_imag(deep=False) == (cos(im(x))*cosh(re(x)), + sin(im(x))*sinh(re(x))) + x = Symbol('x', extended_real=True) + assert cosh(x).as_real_imag(deep=False) == (cosh(x), 0) + + x = Symbol('x', real=True) + assert cosh(I*x).is_finite is True + assert cosh(I*x).is_real is True + assert cosh(I*2 + 1).is_real is False + assert cosh(5*I*S.Pi/2, evaluate=False).is_zero is True + assert cosh(x).is_zero is False + + +def test_cosh_series(): + x = Symbol('x') + assert cosh(x).series(x, 0, 10) == \ + 1 + x**2/2 + x**4/24 + x**6/720 + x**8/40320 + O(x**10) + + +def test_cosh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: cosh(x).fdiff(2)) + + +def test_tanh(): + x, y = symbols('x,y') + + k = Symbol('k', integer=True) + + assert tanh(nan) is nan + assert tanh(zoo) is nan + + assert tanh(oo) == 1 + assert tanh(-oo) == -1 + + assert tanh(0) == 0 + + assert unchanged(tanh, 1) + assert tanh(-1) == -tanh(1) + + assert unchanged(tanh, x) + assert tanh(-x) == -tanh(x) + + assert unchanged(tanh, pi) + assert tanh(-pi) == -tanh(pi) + + assert unchanged(tanh, 2**1024 * E) + assert tanh(-2**1024 * E) == -tanh(2**1024 * E) + + assert tanh(pi*I) == 0 + assert tanh(-pi*I) == 0 + assert tanh(2*pi*I) == 0 + assert tanh(-2*pi*I) == 0 + assert tanh(-3*10**73*pi*I) == 0 + assert tanh(7*10**103*pi*I) == 0 + + assert tanh(pi*I/2) is zoo + assert tanh(-pi*I/2) is zoo + assert tanh(pi*I*Rational(5, 2)) is zoo + assert tanh(pi*I*Rational(7, 2)) is zoo + + assert tanh(pi*I/3) == sqrt(3)*I + assert tanh(pi*I*Rational(-2, 3)) == sqrt(3)*I + + assert tanh(pi*I/4) == I + assert tanh(-pi*I/4) == -I + assert tanh(pi*I*Rational(17, 4)) == I + assert tanh(pi*I*Rational(-3, 4)) == I + + assert tanh(pi*I/6) == I/sqrt(3) + assert tanh(-pi*I/6) == -I/sqrt(3) + assert tanh(pi*I*Rational(7, 6)) == I/sqrt(3) + assert tanh(pi*I*Rational(-5, 6)) == I/sqrt(3) + + assert tanh(pi*I/105) == tan(pi/105)*I + assert tanh(-pi*I/105) == -tan(pi/105)*I + + assert unchanged(tanh, 2 + 3*I) + + assert tanh(x*I) == tan(x)*I + + assert tanh(k*pi*I) == 0 + assert tanh(17*k*pi*I) == 0 + + assert tanh(k*pi*I/2) == tan(k*pi/2)*I + + assert tanh(x).as_real_imag(deep=False) == (sinh(re(x))*cosh(re(x))/(cos(im(x))**2 + + sinh(re(x))**2), + sin(im(x))*cos(im(x))/(cos(im(x))**2 + sinh(re(x))**2)) + x = Symbol('x', extended_real=True) + assert tanh(x).as_real_imag(deep=False) == (tanh(x), 0) + assert tanh(I*pi/3 + 1).is_real is False + assert tanh(x).is_real is True + assert tanh(I*pi*x/2).is_real is None + + +def test_tanh_series(): + x = Symbol('x') + assert tanh(x).series(x, 0, 10) == \ + x - x**3/3 + 2*x**5/15 - 17*x**7/315 + 62*x**9/2835 + O(x**10) + + +def test_tanh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: tanh(x).fdiff(2)) + + +def test_coth(): + x, y = symbols('x,y') + + k = Symbol('k', integer=True) + + assert coth(nan) is nan + assert coth(zoo) is nan + + assert coth(oo) == 1 + assert coth(-oo) == -1 + + assert coth(0) is zoo + assert unchanged(coth, 1) + assert coth(-1) == -coth(1) + + assert unchanged(coth, x) + assert coth(-x) == -coth(x) + + assert coth(pi*I) == -I*cot(pi) + assert coth(-pi*I) == cot(pi)*I + + assert unchanged(coth, 2**1024 * E) + assert coth(-2**1024 * E) == -coth(2**1024 * E) + + assert coth(pi*I) == -I*cot(pi) + assert coth(-pi*I) == I*cot(pi) + assert coth(2*pi*I) == -I*cot(2*pi) + assert coth(-2*pi*I) == I*cot(2*pi) + assert coth(-3*10**73*pi*I) == I*cot(3*10**73*pi) + assert coth(7*10**103*pi*I) == -I*cot(7*10**103*pi) + + assert coth(pi*I/2) == 0 + assert coth(-pi*I/2) == 0 + assert coth(pi*I*Rational(5, 2)) == 0 + assert coth(pi*I*Rational(7, 2)) == 0 + + assert coth(pi*I/3) == -I/sqrt(3) + assert coth(pi*I*Rational(-2, 3)) == -I/sqrt(3) + + assert coth(pi*I/4) == -I + assert coth(-pi*I/4) == I + assert coth(pi*I*Rational(17, 4)) == -I + assert coth(pi*I*Rational(-3, 4)) == -I + + assert coth(pi*I/6) == -sqrt(3)*I + assert coth(-pi*I/6) == sqrt(3)*I + assert coth(pi*I*Rational(7, 6)) == -sqrt(3)*I + assert coth(pi*I*Rational(-5, 6)) == -sqrt(3)*I + + assert coth(pi*I/105) == -cot(pi/105)*I + assert coth(-pi*I/105) == cot(pi/105)*I + + assert unchanged(coth, 2 + 3*I) + + assert coth(x*I) == -cot(x)*I + + assert coth(k*pi*I) == -cot(k*pi)*I + assert coth(17*k*pi*I) == -cot(17*k*pi)*I + + assert coth(k*pi*I) == -cot(k*pi)*I + + assert coth(log(tan(2))) == coth(log(-tan(2))) + assert coth(1 + I*pi/2) == tanh(1) + + assert coth(x).as_real_imag(deep=False) == (sinh(re(x))*cosh(re(x))/(sin(im(x))**2 + + sinh(re(x))**2), + -sin(im(x))*cos(im(x))/(sin(im(x))**2 + sinh(re(x))**2)) + x = Symbol('x', extended_real=True) + assert coth(x).as_real_imag(deep=False) == (coth(x), 0) + + assert expand_trig(coth(2*x)) == (coth(x)**2 + 1)/(2*coth(x)) + assert expand_trig(coth(3*x)) == (coth(x)**3 + 3*coth(x))/(1 + 3*coth(x)**2) + + assert expand_trig(coth(x + y)) == (1 + coth(x)*coth(y))/(coth(x) + coth(y)) + + +def test_coth_series(): + x = Symbol('x') + assert coth(x).series(x, 0, 8) == \ + 1/x + x/3 - x**3/45 + 2*x**5/945 - x**7/4725 + O(x**8) + + +def test_coth_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: coth(x).fdiff(2)) + + +def test_csch(): + x, y = symbols('x,y') + + k = Symbol('k', integer=True) + n = Symbol('n', positive=True) + + assert csch(nan) is nan + assert csch(zoo) is nan + + assert csch(oo) == 0 + assert csch(-oo) == 0 + + assert csch(0) is zoo + + assert csch(-1) == -csch(1) + + assert csch(-x) == -csch(x) + assert csch(-pi) == -csch(pi) + assert csch(-2**1024 * E) == -csch(2**1024 * E) + + assert csch(pi*I) is zoo + assert csch(-pi*I) is zoo + assert csch(2*pi*I) is zoo + assert csch(-2*pi*I) is zoo + assert csch(-3*10**73*pi*I) is zoo + assert csch(7*10**103*pi*I) is zoo + + assert csch(pi*I/2) == -I + assert csch(-pi*I/2) == I + assert csch(pi*I*Rational(5, 2)) == -I + assert csch(pi*I*Rational(7, 2)) == I + + assert csch(pi*I/3) == -2/sqrt(3)*I + assert csch(pi*I*Rational(-2, 3)) == 2/sqrt(3)*I + + assert csch(pi*I/4) == -sqrt(2)*I + assert csch(-pi*I/4) == sqrt(2)*I + assert csch(pi*I*Rational(7, 4)) == sqrt(2)*I + assert csch(pi*I*Rational(-3, 4)) == sqrt(2)*I + + assert csch(pi*I/6) == -2*I + assert csch(-pi*I/6) == 2*I + assert csch(pi*I*Rational(7, 6)) == 2*I + assert csch(pi*I*Rational(-7, 6)) == -2*I + assert csch(pi*I*Rational(-5, 6)) == 2*I + + assert csch(pi*I/105) == -1/sin(pi/105)*I + assert csch(-pi*I/105) == 1/sin(pi/105)*I + + assert csch(x*I) == -1/sin(x)*I + + assert csch(k*pi*I) is zoo + assert csch(17*k*pi*I) is zoo + + assert csch(k*pi*I/2) == -1/sin(k*pi/2)*I + + assert csch(n).is_real is True + + assert expand_trig(csch(x + y)) == 1/(sinh(x)*cosh(y) + cosh(x)*sinh(y)) + + +def test_csch_series(): + x = Symbol('x') + assert csch(x).series(x, 0, 10) == \ + 1/ x - x/6 + 7*x**3/360 - 31*x**5/15120 + 127*x**7/604800 \ + - 73*x**9/3421440 + O(x**10) + + +def test_csch_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: csch(x).fdiff(2)) + + +def test_sech(): + x, y = symbols('x, y') + + k = Symbol('k', integer=True) + n = Symbol('n', positive=True) + + assert sech(nan) is nan + assert sech(zoo) is nan + + assert sech(oo) == 0 + assert sech(-oo) == 0 + + assert sech(0) == 1 + + assert sech(-1) == sech(1) + assert sech(-x) == sech(x) + + assert sech(pi*I) == sec(pi) + + assert sech(-pi*I) == sec(pi) + assert sech(-2**1024 * E) == sech(2**1024 * E) + + assert sech(pi*I/2) is zoo + assert sech(-pi*I/2) is zoo + assert sech((-3*10**73 + 1)*pi*I/2) is zoo + assert sech((7*10**103 + 1)*pi*I/2) is zoo + + assert sech(pi*I) == -1 + assert sech(-pi*I) == -1 + assert sech(5*pi*I) == -1 + assert sech(8*pi*I) == 1 + + assert sech(pi*I/3) == 2 + assert sech(pi*I*Rational(-2, 3)) == -2 + + assert sech(pi*I/4) == sqrt(2) + assert sech(-pi*I/4) == sqrt(2) + assert sech(pi*I*Rational(5, 4)) == -sqrt(2) + assert sech(pi*I*Rational(-5, 4)) == -sqrt(2) + + assert sech(pi*I/6) == 2/sqrt(3) + assert sech(-pi*I/6) == 2/sqrt(3) + assert sech(pi*I*Rational(7, 6)) == -2/sqrt(3) + assert sech(pi*I*Rational(-5, 6)) == -2/sqrt(3) + + assert sech(pi*I/105) == 1/cos(pi/105) + assert sech(-pi*I/105) == 1/cos(pi/105) + + assert sech(x*I) == 1/cos(x) + + assert sech(k*pi*I) == 1/cos(k*pi) + assert sech(17*k*pi*I) == 1/cos(17*k*pi) + + assert sech(n).is_real is True + + assert expand_trig(sech(x + y)) == 1/(cosh(x)*cosh(y) + sinh(x)*sinh(y)) + + +def test_sech_series(): + x = Symbol('x') + assert sech(x).series(x, 0, 10) == \ + 1 - x**2/2 + 5*x**4/24 - 61*x**6/720 + 277*x**8/8064 + O(x**10) + + +def test_sech_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: sech(x).fdiff(2)) + + +def test_asinh(): + x, y = symbols('x,y') + assert unchanged(asinh, x) + assert asinh(-x) == -asinh(x) + + # at specific points + assert asinh(nan) is nan + assert asinh( 0) == 0 + assert asinh(+1) == log(sqrt(2) + 1) + + assert asinh(-1) == log(sqrt(2) - 1) + assert asinh(I) == pi*I/2 + assert asinh(-I) == -pi*I/2 + assert asinh(I/2) == pi*I/6 + assert asinh(-I/2) == -pi*I/6 + + # at infinites + assert asinh(oo) is oo + assert asinh(-oo) is -oo + + assert asinh(I*oo) is oo + assert asinh(-I *oo) is -oo + + assert asinh(zoo) is zoo + + # properties + assert asinh(I *(sqrt(3) - 1)/(2**Rational(3, 2))) == pi*I/12 + assert asinh(-I *(sqrt(3) - 1)/(2**Rational(3, 2))) == -pi*I/12 + + assert asinh(I*(sqrt(5) - 1)/4) == pi*I/10 + assert asinh(-I*(sqrt(5) - 1)/4) == -pi*I/10 + + assert asinh(I*(sqrt(5) + 1)/4) == pi*I*Rational(3, 10) + assert asinh(-I*(sqrt(5) + 1)/4) == pi*I*Rational(-3, 10) + + # reality + assert asinh(S(2)).is_real is True + assert asinh(S(2)).is_finite is True + assert asinh(S(-2)).is_real is True + assert asinh(S(oo)).is_extended_real is True + assert asinh(-S(oo)).is_real is False + assert (asinh(2) - oo) == -oo + assert asinh(symbols('y', real=True)).is_real is True + + # Symmetry + assert asinh(Rational(-1, 2)) == -asinh(S.Half) + + # inverse composition + assert unchanged(asinh, sinh(Symbol('v1'))) + + assert asinh(sinh(0, evaluate=False)) == 0 + assert asinh(sinh(-3, evaluate=False)) == -3 + assert asinh(sinh(2, evaluate=False)) == 2 + assert asinh(sinh(I, evaluate=False)) == I + assert asinh(sinh(-I, evaluate=False)) == -I + assert asinh(sinh(5*I, evaluate=False)) == -2*I*pi + 5*I + assert asinh(sinh(15 + 11*I)) == 15 - 4*I*pi + 11*I + assert asinh(sinh(-73 + 97*I)) == 73 - 97*I + 31*I*pi + assert asinh(sinh(-7 - 23*I)) == 7 - 7*I*pi + 23*I + assert asinh(sinh(13 - 3*I)) == -13 - I*pi + 3*I + p = Symbol('p', positive=True) + assert asinh(p).is_zero is False + assert asinh(sinh(0, evaluate=False), evaluate=False).is_zero is True + + +def test_asinh_rewrite(): + x = Symbol('x') + assert asinh(x).rewrite(log) == log(x + sqrt(x**2 + 1)) + assert asinh(x).rewrite(atanh) == atanh(x/sqrt(1 + x**2)) + assert asinh(x).rewrite(asin) == -I*asin(I*x, evaluate=False) + assert asinh(x*(1 + I)).rewrite(asin) == -I*asin(I*x*(1+I)) + assert asinh(x).rewrite(acos) == I*acos(I*x, evaluate=False) - I*pi/2 + + +def test_asinh_leading_term(): + x = Symbol('x') + assert asinh(x).as_leading_term(x, cdir=1) == x + # Tests concerning branch points + assert asinh(x + I).as_leading_term(x, cdir=1) == I*pi/2 + assert asinh(x - I).as_leading_term(x, cdir=1) == -I*pi/2 + assert asinh(1/x).as_leading_term(x, cdir=1) == -log(x) + log(2) + assert asinh(1/x).as_leading_term(x, cdir=-1) == log(x) - log(2) - I*pi + # Tests concerning points lying on branch cuts + assert asinh(x + 2*I).as_leading_term(x, cdir=1) == I*asin(2) + assert asinh(x + 2*I).as_leading_term(x, cdir=-1) == -I*asin(2) + I*pi + assert asinh(x - 2*I).as_leading_term(x, cdir=1) == -I*pi + I*asin(2) + assert asinh(x - 2*I).as_leading_term(x, cdir=-1) == -I*asin(2) + # Tests concerning re(ndir) == 0 + assert asinh(2*I + I*x - x**2).as_leading_term(x, cdir=1) == log(2 - sqrt(3)) + I*pi/2 + assert asinh(2*I + I*x - x**2).as_leading_term(x, cdir=-1) == log(2 - sqrt(3)) + I*pi/2 + + +def test_asinh_series(): + x = Symbol('x') + assert asinh(x).series(x, 0, 8) == \ + x - x**3/6 + 3*x**5/40 - 5*x**7/112 + O(x**8) + t5 = asinh(x).taylor_term(5, x) + assert t5 == 3*x**5/40 + assert asinh(x).taylor_term(7, x, t5, 0) == -5*x**7/112 + + +def test_asinh_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert asinh(x + I)._eval_nseries(x, 4, None) == I*pi/2 - \ + sqrt(2)*sqrt(I)*I*sqrt(x) + sqrt(2)*sqrt(I)*x**(S(3)/2)/12 + 3*sqrt(2)*sqrt(I)*I*x**(S(5)/2)/160 - \ + 5*sqrt(2)*sqrt(I)*x**(S(7)/2)/896 + O(x**4) + assert asinh(x - I)._eval_nseries(x, 4, None) == -I*pi/2 + \ + sqrt(2)*I*sqrt(x)*sqrt(-I) + sqrt(2)*x**(S(3)/2)*sqrt(-I)/12 - \ + 3*sqrt(2)*I*x**(S(5)/2)*sqrt(-I)/160 - 5*sqrt(2)*x**(S(7)/2)*sqrt(-I)/896 + O(x**4) + # Tests concerning points lying on branch cuts + assert asinh(x + 2*I)._eval_nseries(x, 4, None, cdir=1) == I*asin(2) - \ + sqrt(3)*I*x/3 + sqrt(3)*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + assert asinh(x + 2*I)._eval_nseries(x, 4, None, cdir=-1) == I*pi - I*asin(2) + \ + sqrt(3)*I*x/3 - sqrt(3)*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert asinh(x - 2*I)._eval_nseries(x, 4, None, cdir=1) == I*asin(2) - I*pi + \ + sqrt(3)*I*x/3 + sqrt(3)*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert asinh(x - 2*I)._eval_nseries(x, 4, None, cdir=-1) == -I*asin(2) - \ + sqrt(3)*I*x/3 - sqrt(3)*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + # Tests concerning re(ndir) == 0 + assert asinh(2*I + I*x - x**2)._eval_nseries(x, 4, None) == I*pi/2 + log(2 - sqrt(3)) + \ + x*(-3 + 2*sqrt(3))/(-6 + 3*sqrt(3)) + x**2*(12 - 36*I + sqrt(3)*(-7 + 21*I))/(-63 + \ + 36*sqrt(3)) + x**3*(-168 + sqrt(3)*(97 - 388*I) + 672*I)/(-1746 + 1008*sqrt(3)) + O(x**4) + + +def test_asinh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: asinh(x).fdiff(2)) + + +def test_acosh(): + x = Symbol('x') + + assert unchanged(acosh, -x) + + #at specific points + assert acosh(1) == 0 + assert acosh(-1) == pi*I + assert acosh(0) == I*pi/2 + assert acosh(S.Half) == I*pi/3 + assert acosh(Rational(-1, 2)) == pi*I*Rational(2, 3) + assert acosh(nan) is nan + + # at infinites + assert acosh(oo) is oo + assert acosh(-oo) is oo + + assert acosh(I*oo) == oo + I*pi/2 + assert acosh(-I*oo) == oo - I*pi/2 + + assert acosh(zoo) is zoo + + assert acosh(I) == log(I*(1 + sqrt(2))) + assert acosh(-I) == log(-I*(1 + sqrt(2))) + assert acosh((sqrt(3) - 1)/(2*sqrt(2))) == pi*I*Rational(5, 12) + assert acosh(-(sqrt(3) - 1)/(2*sqrt(2))) == pi*I*Rational(7, 12) + assert acosh(sqrt(2)/2) == I*pi/4 + assert acosh(-sqrt(2)/2) == I*pi*Rational(3, 4) + assert acosh(sqrt(3)/2) == I*pi/6 + assert acosh(-sqrt(3)/2) == I*pi*Rational(5, 6) + assert acosh(sqrt(2 + sqrt(2))/2) == I*pi/8 + assert acosh(-sqrt(2 + sqrt(2))/2) == I*pi*Rational(7, 8) + assert acosh(sqrt(2 - sqrt(2))/2) == I*pi*Rational(3, 8) + assert acosh(-sqrt(2 - sqrt(2))/2) == I*pi*Rational(5, 8) + assert acosh((1 + sqrt(3))/(2*sqrt(2))) == I*pi/12 + assert acosh(-(1 + sqrt(3))/(2*sqrt(2))) == I*pi*Rational(11, 12) + assert acosh((sqrt(5) + 1)/4) == I*pi/5 + assert acosh(-(sqrt(5) + 1)/4) == I*pi*Rational(4, 5) + + assert str(acosh(5*I).n(6)) == '2.31244 + 1.5708*I' + assert str(acosh(-5*I).n(6)) == '2.31244 - 1.5708*I' + + # inverse composition + assert unchanged(acosh, Symbol('v1')) + + assert acosh(cosh(-3, evaluate=False)) == 3 + assert acosh(cosh(3, evaluate=False)) == 3 + assert acosh(cosh(0, evaluate=False)) == 0 + assert acosh(cosh(I, evaluate=False)) == I + assert acosh(cosh(-I, evaluate=False)) == I + assert acosh(cosh(7*I, evaluate=False)) == -2*I*pi + 7*I + assert acosh(cosh(1 + I)) == 1 + I + assert acosh(cosh(3 - 3*I)) == 3 - 3*I + assert acosh(cosh(-3 + 2*I)) == 3 - 2*I + assert acosh(cosh(-5 - 17*I)) == 5 - 6*I*pi + 17*I + assert acosh(cosh(-21 + 11*I)) == 21 - 11*I + 4*I*pi + assert acosh(cosh(cosh(1) + I)) == cosh(1) + I + assert acosh(1, evaluate=False).is_zero is True + + # Reality + assert acosh(S(2)).is_real is True + assert acosh(S(2)).is_extended_real is True + assert acosh(oo).is_extended_real is True + assert acosh(S(2)).is_finite is True + assert acosh(S(1) / 5).is_real is False + assert (acosh(2) - oo) == -oo + assert acosh(symbols('y', real=True)).is_real is None + + +def test_acosh_rewrite(): + x = Symbol('x') + assert acosh(x).rewrite(log) == log(x + sqrt(x - 1)*sqrt(x + 1)) + assert acosh(x).rewrite(asin) == sqrt(x - 1)*(-asin(x) + pi/2)/sqrt(1 - x) + assert acosh(x).rewrite(asinh) == sqrt(x - 1)*(I*asinh(I*x, evaluate=False) + pi/2)/sqrt(1 - x) + assert acosh(x).rewrite(atanh) == \ + (sqrt(x - 1)*sqrt(x + 1)*atanh(sqrt(x**2 - 1)/x)/sqrt(x**2 - 1) + + pi*sqrt(x - 1)*(-x*sqrt(x**(-2)) + 1)/(2*sqrt(1 - x))) + x = Symbol('x', positive=True) + assert acosh(x).rewrite(atanh) == \ + sqrt(x - 1)*sqrt(x + 1)*atanh(sqrt(x**2 - 1)/x)/sqrt(x**2 - 1) + + +def test_acosh_leading_term(): + x = Symbol('x') + # Tests concerning branch points + assert acosh(x).as_leading_term(x) == I*pi/2 + assert acosh(x + 1).as_leading_term(x) == sqrt(2)*sqrt(x) + assert acosh(x - 1).as_leading_term(x) == I*pi + assert acosh(1/x).as_leading_term(x, cdir=1) == -log(x) + log(2) + assert acosh(1/x).as_leading_term(x, cdir=-1) == -log(x) + log(2) + 2*I*pi + # Tests concerning points lying on branch cuts + assert acosh(I*x - 2).as_leading_term(x, cdir=1) == acosh(-2) + assert acosh(-I*x - 2).as_leading_term(x, cdir=1) == -2*I*pi + acosh(-2) + assert acosh(x**2 - I*x + S(1)/3).as_leading_term(x, cdir=1) == -acosh(S(1)/3) + assert acosh(x**2 - I*x + S(1)/3).as_leading_term(x, cdir=-1) == acosh(S(1)/3) + assert acosh(1/(I*x - 3)).as_leading_term(x, cdir=1) == -acosh(-S(1)/3) + assert acosh(1/(I*x - 3)).as_leading_term(x, cdir=-1) == acosh(-S(1)/3) + # Tests concerning im(ndir) == 0 + assert acosh(-I*x**2 + x - 2).as_leading_term(x, cdir=1) == log(sqrt(3) + 2) - I*pi + assert acosh(-I*x**2 + x - 2).as_leading_term(x, cdir=-1) == log(sqrt(3) + 2) - I*pi + + +def test_acosh_series(): + x = Symbol('x') + assert acosh(x).series(x, 0, 8) == \ + -I*x + pi*I/2 - I*x**3/6 - 3*I*x**5/40 - 5*I*x**7/112 + O(x**8) + t5 = acosh(x).taylor_term(5, x) + assert t5 == - 3*I*x**5/40 + assert acosh(x).taylor_term(7, x, t5, 0) == - 5*I*x**7/112 + + +def test_acosh_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert acosh(x + 1)._eval_nseries(x, 4, None) == sqrt(2)*sqrt(x) - \ + sqrt(2)*x**(S(3)/2)/12 + 3*sqrt(2)*x**(S(5)/2)/160 - 5*sqrt(2)*x**(S(7)/2)/896 + O(x**4) + # Tests concerning points lying on branch cuts + assert acosh(x - 1)._eval_nseries(x, 4, None) == I*pi - \ + sqrt(2)*I*sqrt(x) - sqrt(2)*I*x**(S(3)/2)/12 - 3*sqrt(2)*I*x**(S(5)/2)/160 - \ + 5*sqrt(2)*I*x**(S(7)/2)/896 + O(x**4) + assert acosh(I*x - 2)._eval_nseries(x, 4, None, cdir=1) == acosh(-2) - \ + sqrt(3)*I*x/3 + sqrt(3)*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + assert acosh(-I*x - 2)._eval_nseries(x, 4, None, cdir=1) == acosh(-2) - \ + 2*I*pi + sqrt(3)*I*x/3 + sqrt(3)*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert acosh(1/(I*x - 3))._eval_nseries(x, 4, None, cdir=1) == -acosh(-S(1)/3) + \ + sqrt(2)*x/12 + 17*sqrt(2)*I*x**2/576 - 443*sqrt(2)*x**3/41472 + O(x**4) + assert acosh(1/(I*x - 3))._eval_nseries(x, 4, None, cdir=-1) == acosh(-S(1)/3) - \ + sqrt(2)*x/12 - 17*sqrt(2)*I*x**2/576 + 443*sqrt(2)*x**3/41472 + O(x**4) + # Tests concerning im(ndir) == 0 + assert acosh(-I*x**2 + x - 2)._eval_nseries(x, 4, None) == -I*pi + log(sqrt(3) + 2) + \ + x*(-2*sqrt(3) - 3)/(3*sqrt(3) + 6) + x**2*(-12 + 36*I + sqrt(3)*(-7 + 21*I))/(36*sqrt(3) + \ + 63) + x**3*(-168 + 672*I + sqrt(3)*(-97 + 388*I))/(1008*sqrt(3) + 1746) + O(x**4) + + +def test_acosh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: acosh(x).fdiff(2)) + + +def test_asech(): + x = Symbol('x') + + assert unchanged(asech, -x) + + # values at fixed points + assert asech(1) == 0 + assert asech(-1) == pi*I + assert asech(0) is oo + assert asech(2) == I*pi/3 + assert asech(-2) == 2*I*pi / 3 + assert asech(nan) is nan + + # at infinites + assert asech(oo) == I*pi/2 + assert asech(-oo) == I*pi/2 + assert asech(zoo) == I*AccumBounds(-pi/2, pi/2) + + assert asech(I) == log(1 + sqrt(2)) - I*pi/2 + assert asech(-I) == log(1 + sqrt(2)) + I*pi/2 + assert asech(sqrt(2) - sqrt(6)) == 11*I*pi / 12 + assert asech(sqrt(2 - 2/sqrt(5))) == I*pi / 10 + assert asech(-sqrt(2 - 2/sqrt(5))) == 9*I*pi / 10 + assert asech(2 / sqrt(2 + sqrt(2))) == I*pi / 8 + assert asech(-2 / sqrt(2 + sqrt(2))) == 7*I*pi / 8 + assert asech(sqrt(5) - 1) == I*pi / 5 + assert asech(1 - sqrt(5)) == 4*I*pi / 5 + assert asech(-sqrt(2*(2 + sqrt(2)))) == 5*I*pi / 8 + + # properties + # asech(x) == acosh(1/x) + assert asech(sqrt(2)) == acosh(1/sqrt(2)) + assert asech(2/sqrt(3)) == acosh(sqrt(3)/2) + assert asech(2/sqrt(2 + sqrt(2))) == acosh(sqrt(2 + sqrt(2))/2) + assert asech(2) == acosh(S.Half) + + # reality + assert asech(S(2)).is_real is False + assert asech(-S(1) / 3).is_real is False + assert asech(S(2) / 3).is_finite is True + assert asech(S(0)).is_real is False + assert asech(S(0)).is_extended_real is True + assert asech(symbols('y', real=True)).is_real is None + + # asech(x) == I*acos(1/x) + # (Note: the exact formula is asech(x) == +/- I*acos(1/x)) + assert asech(-sqrt(2)) == I*acos(-1/sqrt(2)) + assert asech(-2/sqrt(3)) == I*acos(-sqrt(3)/2) + assert asech(-S(2)) == I*acos(Rational(-1, 2)) + assert asech(-2/sqrt(2)) == I*acos(-sqrt(2)/2) + + # sech(asech(x)) / x == 1 + assert expand_mul(sech(asech(sqrt(6) - sqrt(2))) / (sqrt(6) - sqrt(2))) == 1 + assert expand_mul(sech(asech(sqrt(6) + sqrt(2))) / (sqrt(6) + sqrt(2))) == 1 + assert (sech(asech(sqrt(2 + 2/sqrt(5)))) / (sqrt(2 + 2/sqrt(5)))).simplify() == 1 + assert (sech(asech(-sqrt(2 + 2/sqrt(5)))) / (-sqrt(2 + 2/sqrt(5)))).simplify() == 1 + assert (sech(asech(sqrt(2*(2 + sqrt(2))))) / (sqrt(2*(2 + sqrt(2))))).simplify() == 1 + assert expand_mul(sech(asech(1 + sqrt(5))) / (1 + sqrt(5))) == 1 + assert expand_mul(sech(asech(-1 - sqrt(5))) / (-1 - sqrt(5))) == 1 + assert expand_mul(sech(asech(-sqrt(6) - sqrt(2))) / (-sqrt(6) - sqrt(2))) == 1 + + # numerical evaluation + assert str(asech(5*I).n(6)) == '0.19869 - 1.5708*I' + assert str(asech(-5*I).n(6)) == '0.19869 + 1.5708*I' + + +def test_asech_leading_term(): + x = Symbol('x') + # Tests concerning branch points + assert asech(x).as_leading_term(x, cdir=1) == -log(x) + log(2) + assert asech(x).as_leading_term(x, cdir=-1) == -log(x) + log(2) + 2*I*pi + assert asech(x + 1).as_leading_term(x, cdir=1) == sqrt(2)*I*sqrt(x) + assert asech(1/x).as_leading_term(x, cdir=1) == I*pi/2 + # Tests concerning points lying on branch cuts + assert asech(x - 1).as_leading_term(x, cdir=1) == I*pi + assert asech(I*x + 3).as_leading_term(x, cdir=1) == -asech(3) + assert asech(-I*x + 3).as_leading_term(x, cdir=1) == asech(3) + assert asech(I*x - 3).as_leading_term(x, cdir=1) == -asech(-3) + assert asech(-I*x - 3).as_leading_term(x, cdir=1) == asech(-3) + assert asech(I*x - S(1)/3).as_leading_term(x, cdir=1) == -2*I*pi + asech(-S(1)/3) + assert asech(I*x - S(1)/3).as_leading_term(x, cdir=-1) == asech(-S(1)/3) + # Tests concerning im(ndir) == 0 + assert asech(-I*x**2 + x - 3).as_leading_term(x, cdir=1) == log(-S(1)/3 + 2*sqrt(2)*I/3) + assert asech(-I*x**2 + x - 3).as_leading_term(x, cdir=-1) == log(-S(1)/3 + 2*sqrt(2)*I/3) + + +def test_asech_series(): + x = Symbol('x') + assert asech(x).series(x, 0, 9, cdir=1) == log(2) - log(x) - x**2/4 - 3*x**4/32 \ + - 5*x**6/96 - 35*x**8/1024 + O(x**9) + assert asech(x).series(x, 0, 9, cdir=-1) == I*pi + log(2) - log(-x) - x**2/4 - \ + 3*x**4/32 - 5*x**6/96 - 35*x**8/1024 + O(x**9) + t6 = asech(x).taylor_term(6, x) + assert t6 == -5*x**6/96 + assert asech(x).taylor_term(8, x, t6, 0) == -35*x**8/1024 + + +def test_asech_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert asech(x + 1)._eval_nseries(x, 4, None) == sqrt(2)*sqrt(-x) + 5*sqrt(2)*(-x)**(S(3)/2)/12 + \ + 43*sqrt(2)*(-x)**(S(5)/2)/160 + 177*sqrt(2)*(-x)**(S(7)/2)/896 + O(x**4) + # Tests concerning points lying on branch cuts + assert asech(x - 1)._eval_nseries(x, 4, None) == I*pi + sqrt(2)*sqrt(x) + \ + 5*sqrt(2)*x**(S(3)/2)/12 + 43*sqrt(2)*x**(S(5)/2)/160 + 177*sqrt(2)*x**(S(7)/2)/896 + O(x**4) + assert asech(I*x + 3)._eval_nseries(x, 4, None) == -asech(3) + sqrt(2)*x/12 - \ + 17*sqrt(2)*I*x**2/576 - 443*sqrt(2)*x**3/41472 + O(x**4) + assert asech(-I*x + 3)._eval_nseries(x, 4, None) == asech(3) + sqrt(2)*x/12 + \ + 17*sqrt(2)*I*x**2/576 - 443*sqrt(2)*x**3/41472 + O(x**4) + assert asech(I*x - 3)._eval_nseries(x, 4, None) == -asech(-3) - sqrt(2)*x/12 - \ + 17*sqrt(2)*I*x**2/576 + 443*sqrt(2)*x**3/41472 + O(x**4) + assert asech(-I*x - 3)._eval_nseries(x, 4, None) == asech(-3) - sqrt(2)*x/12 + \ + 17*sqrt(2)*I*x**2/576 + 443*sqrt(2)*x**3/41472 + O(x**4) + # Tests concerning im(ndir) == 0 + assert asech(-I*x**2 + x - 2)._eval_nseries(x, 3, None) == 2*I*pi/3 + \ + x*(-sqrt(3) + 3*I)/(6*sqrt(3) + 6*I) + x**2*(36 + sqrt(3)*(7 - 12*I) + 21*I)/(72*sqrt(3) - \ + 72*I) + O(x**3) + + +def test_asech_rewrite(): + x = Symbol('x') + assert asech(x).rewrite(log) == log(1/x + sqrt(1/x - 1) * sqrt(1/x + 1)) + assert asech(x).rewrite(acosh) == acosh(1/x) + assert asech(x).rewrite(asinh) == sqrt(-1 + 1/x)*(I*asinh(I/x, evaluate=False) + pi/2)/sqrt(1 - 1/x) + assert asech(x).rewrite(atanh) == \ + sqrt(x + 1)*sqrt(1/(x + 1))*atanh(sqrt(1 - x**2)) + I*pi*(-sqrt(x)*sqrt(1/x) + 1 - I*sqrt(x**2)/(2*sqrt(-x**2)) - I*sqrt(-x)/(2*sqrt(x))) + + +def test_asech_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: asech(x).fdiff(2)) + + +def test_acsch(): + x = Symbol('x') + + assert unchanged(acsch, x) + assert acsch(-x) == -acsch(x) + + # values at fixed points + assert acsch(1) == log(1 + sqrt(2)) + assert acsch(-1) == - log(1 + sqrt(2)) + assert acsch(0) is zoo + assert acsch(2) == log((1+sqrt(5))/2) + assert acsch(-2) == - log((1+sqrt(5))/2) + + assert acsch(I) == - I*pi/2 + assert acsch(-I) == I*pi/2 + assert acsch(-I*(sqrt(6) + sqrt(2))) == I*pi / 12 + assert acsch(I*(sqrt(2) + sqrt(6))) == -I*pi / 12 + assert acsch(-I*(1 + sqrt(5))) == I*pi / 10 + assert acsch(I*(1 + sqrt(5))) == -I*pi / 10 + assert acsch(-I*2 / sqrt(2 - sqrt(2))) == I*pi / 8 + assert acsch(I*2 / sqrt(2 - sqrt(2))) == -I*pi / 8 + assert acsch(-I*2) == I*pi / 6 + assert acsch(I*2) == -I*pi / 6 + assert acsch(-I*sqrt(2 + 2/sqrt(5))) == I*pi / 5 + assert acsch(I*sqrt(2 + 2/sqrt(5))) == -I*pi / 5 + assert acsch(-I*sqrt(2)) == I*pi / 4 + assert acsch(I*sqrt(2)) == -I*pi / 4 + assert acsch(-I*(sqrt(5)-1)) == 3*I*pi / 10 + assert acsch(I*(sqrt(5)-1)) == -3*I*pi / 10 + assert acsch(-I*2 / sqrt(3)) == I*pi / 3 + assert acsch(I*2 / sqrt(3)) == -I*pi / 3 + assert acsch(-I*2 / sqrt(2 + sqrt(2))) == 3*I*pi / 8 + assert acsch(I*2 / sqrt(2 + sqrt(2))) == -3*I*pi / 8 + assert acsch(-I*sqrt(2 - 2/sqrt(5))) == 2*I*pi / 5 + assert acsch(I*sqrt(2 - 2/sqrt(5))) == -2*I*pi / 5 + assert acsch(-I*(sqrt(6) - sqrt(2))) == 5*I*pi / 12 + assert acsch(I*(sqrt(6) - sqrt(2))) == -5*I*pi / 12 + assert acsch(nan) is nan + + # properties + # acsch(x) == asinh(1/x) + assert acsch(-I*sqrt(2)) == asinh(I/sqrt(2)) + assert acsch(-I*2 / sqrt(3)) == asinh(I*sqrt(3) / 2) + + # reality + assert acsch(S(2)).is_real is True + assert acsch(S(2)).is_finite is True + assert acsch(S(-2)).is_real is True + assert acsch(S(oo)).is_extended_real is True + assert acsch(-S(oo)).is_real is True + assert (acsch(2) - oo) == -oo + assert acsch(symbols('y', extended_real=True)).is_extended_real is True + + # acsch(x) == -I*asin(I/x) + assert acsch(-I*sqrt(2)) == -I*asin(-1/sqrt(2)) + assert acsch(-I*2 / sqrt(3)) == -I*asin(-sqrt(3)/2) + + # csch(acsch(x)) / x == 1 + assert expand_mul(csch(acsch(-I*(sqrt(6) + sqrt(2)))) / (-I*(sqrt(6) + sqrt(2)))) == 1 + assert expand_mul(csch(acsch(I*(1 + sqrt(5)))) / (I*(1 + sqrt(5)))) == 1 + assert (csch(acsch(I*sqrt(2 - 2/sqrt(5)))) / (I*sqrt(2 - 2/sqrt(5)))).simplify() == 1 + assert (csch(acsch(-I*sqrt(2 - 2/sqrt(5)))) / (-I*sqrt(2 - 2/sqrt(5)))).simplify() == 1 + + # numerical evaluation + assert str(acsch(5*I+1).n(6)) == '0.0391819 - 0.193363*I' + assert str(acsch(-5*I+1).n(6)) == '0.0391819 + 0.193363*I' + + +def test_acsch_infinities(): + assert acsch(oo) == 0 + assert acsch(-oo) == 0 + assert acsch(zoo) == 0 + + +def test_acsch_leading_term(): + x = Symbol('x') + assert acsch(1/x).as_leading_term(x) == x + # Tests concerning branch points + assert acsch(x + I).as_leading_term(x) == -I*pi/2 + assert acsch(x - I).as_leading_term(x) == I*pi/2 + # Tests concerning points lying on branch cuts + assert acsch(x).as_leading_term(x, cdir=1) == -log(x) + log(2) + assert acsch(x).as_leading_term(x, cdir=-1) == log(x) - log(2) - I*pi + assert acsch(x + I/2).as_leading_term(x, cdir=1) == -I*pi - acsch(I/2) + assert acsch(x + I/2).as_leading_term(x, cdir=-1) == acsch(I/2) + assert acsch(x - I/2).as_leading_term(x, cdir=1) == -acsch(I/2) + assert acsch(x - I/2).as_leading_term(x, cdir=-1) == acsch(I/2) + I*pi + # Tests concerning re(ndir) == 0 + assert acsch(I/2 + I*x - x**2).as_leading_term(x, cdir=1) == log(2 - sqrt(3)) - I*pi/2 + assert acsch(I/2 + I*x - x**2).as_leading_term(x, cdir=-1) == log(2 - sqrt(3)) - I*pi/2 + + +def test_acsch_series(): + x = Symbol('x') + assert acsch(x).series(x, 0, 9) == log(2) - log(x) + x**2/4 - 3*x**4/32 \ + + 5*x**6/96 - 35*x**8/1024 + O(x**9) + t4 = acsch(x).taylor_term(4, x) + assert t4 == -3*x**4/32 + assert acsch(x).taylor_term(6, x, t4, 0) == 5*x**6/96 + + +def test_acsch_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert acsch(x + I)._eval_nseries(x, 4, None) == -I*pi/2 + \ + sqrt(2)*I*sqrt(x)*sqrt(-I) - 5*x**(S(3)/2)*(1 - I)/12 - \ + 43*sqrt(2)*I*x**(S(5)/2)*sqrt(-I)/160 + 177*x**(S(7)/2)*(1 - I)/896 + O(x**4) + assert acsch(x - I)._eval_nseries(x, 4, None) == I*pi/2 - \ + sqrt(2)*sqrt(I)*I*sqrt(x) - 5*x**(S(3)/2)*(1 + I)/12 + \ + 43*sqrt(2)*sqrt(I)*I*x**(S(5)/2)/160 + 177*x**(S(7)/2)*(1 + I)/896 + O(x**4) + # Tests concerning points lying on branch cuts + assert acsch(x + I/2)._eval_nseries(x, 4, None, cdir=1) == -acsch(I/2) - \ + I*pi + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsch(x + I/2)._eval_nseries(x, 4, None, cdir=-1) == acsch(I/2) - \ + 4*sqrt(3)*I*x/3 + 8*sqrt(3)*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsch(x - I/2)._eval_nseries(x, 4, None, cdir=1) == -acsch(I/2) - \ + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsch(x - I/2)._eval_nseries(x, 4, None, cdir=-1) == I*pi + \ + acsch(I/2) + 4*sqrt(3)*I*x/3 + 8*sqrt(3)*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + # Tests concerning re(ndir) == 0 + assert acsch(I/2 + I*x - x**2)._eval_nseries(x, 4, None) == -I*pi/2 + \ + log(2 - sqrt(3)) + x*(12 - 8*sqrt(3))/(-6 + 3*sqrt(3)) + x**2*(-96 + \ + sqrt(3)*(56 - 84*I) + 144*I)/(-63 + 36*sqrt(3)) + x**3*(2688 - 2688*I + \ + sqrt(3)*(-1552 + 1552*I))/(-873 + 504*sqrt(3)) + O(x**4) + + +def test_acsch_rewrite(): + x = Symbol('x') + assert acsch(x).rewrite(log) == log(1/x + sqrt(1/x**2 + 1)) + assert acsch(x).rewrite(asinh) == asinh(1/x) + assert acsch(x).rewrite(atanh) == (sqrt(-x**2)*(-sqrt(-(x**2 + 1)**2) + *atanh(sqrt(x**2 + 1))/(x**2 + 1) + + pi/2)/x) + + +def test_acsch_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: acsch(x).fdiff(2)) + + +def test_atanh(): + x = Symbol('x') + + # at specific points + assert atanh(0) == 0 + assert atanh(I) == I*pi/4 + assert atanh(-I) == -I*pi/4 + assert atanh(1) is oo + assert atanh(-1) is -oo + assert atanh(nan) is nan + + # at infinites + assert atanh(oo) == -I*pi/2 + assert atanh(-oo) == I*pi/2 + + assert atanh(I*oo) == I*pi/2 + assert atanh(-I*oo) == -I*pi/2 + + assert atanh(zoo) == I*AccumBounds(-pi/2, pi/2) + + # properties + assert atanh(-x) == -atanh(x) + + # reality + assert atanh(S(2)).is_real is False + assert atanh(S(-1)/5).is_real is True + assert atanh(symbols('y', extended_real=True)).is_real is None + assert atanh(S(1)).is_real is False + assert atanh(S(1)).is_extended_real is True + assert atanh(S(-1)).is_real is False + + # special values + assert atanh(I/sqrt(3)) == I*pi/6 + assert atanh(-I/sqrt(3)) == -I*pi/6 + assert atanh(I*sqrt(3)) == I*pi/3 + assert atanh(-I*sqrt(3)) == -I*pi/3 + assert atanh(I*(1 + sqrt(2))) == pi*I*Rational(3, 8) + assert atanh(I*(sqrt(2) - 1)) == pi*I/8 + assert atanh(I*(1 - sqrt(2))) == -pi*I/8 + assert atanh(-I*(1 + sqrt(2))) == pi*I*Rational(-3, 8) + assert atanh(I*sqrt(5 + 2*sqrt(5))) == I*pi*Rational(2, 5) + assert atanh(-I*sqrt(5 + 2*sqrt(5))) == I*pi*Rational(-2, 5) + assert atanh(I*(2 - sqrt(3))) == pi*I/12 + assert atanh(I*(sqrt(3) - 2)) == -pi*I/12 + assert atanh(oo) == -I*pi/2 + + # Symmetry + assert atanh(Rational(-1, 2)) == -atanh(S.Half) + + # inverse composition + assert unchanged(atanh, tanh(Symbol('v1'))) + + assert atanh(tanh(-5, evaluate=False)) == -5 + assert atanh(tanh(0, evaluate=False)) == 0 + assert atanh(tanh(7, evaluate=False)) == 7 + assert atanh(tanh(I, evaluate=False)) == I + assert atanh(tanh(-I, evaluate=False)) == -I + assert atanh(tanh(-11*I, evaluate=False)) == -11*I + 4*I*pi + assert atanh(tanh(3 + I)) == 3 + I + assert atanh(tanh(4 + 5*I)) == 4 - 2*I*pi + 5*I + assert atanh(tanh(pi/2)) == pi/2 + assert atanh(tanh(pi)) == pi + assert atanh(tanh(-3 + 7*I)) == -3 - 2*I*pi + 7*I + assert atanh(tanh(9 - I*2/3)) == 9 - I*2/3 + assert atanh(tanh(-32 - 123*I)) == -32 - 123*I + 39*I*pi + + +def test_atanh_rewrite(): + x = Symbol('x') + assert atanh(x).rewrite(log) == (log(1 + x) - log(1 - x)) / 2 + assert atanh(x).rewrite(asinh) == \ + pi*x/(2*sqrt(-x**2)) - sqrt(-x)*sqrt(1 - x**2)*sqrt(1/(x**2 - 1))*asinh(sqrt(1/(x**2 - 1)))/sqrt(x) + + +def test_atanh_leading_term(): + x = Symbol('x') + assert atanh(x).as_leading_term(x) == x + # Tests concerning branch points + assert atanh(x + 1).as_leading_term(x, cdir=1) == -log(x)/2 + log(2)/2 - I*pi/2 + assert atanh(x + 1).as_leading_term(x, cdir=-1) == -log(x)/2 + log(2)/2 + I*pi/2 + assert atanh(x - 1).as_leading_term(x, cdir=1) == log(x)/2 - log(2)/2 + assert atanh(x - 1).as_leading_term(x, cdir=-1) == log(x)/2 - log(2)/2 + assert atanh(1/x).as_leading_term(x, cdir=1) == -I*pi/2 + assert atanh(1/x).as_leading_term(x, cdir=-1) == I*pi/2 + # Tests concerning points lying on branch cuts + assert atanh(I*x + 2).as_leading_term(x, cdir=1) == atanh(2) + I*pi + assert atanh(-I*x + 2).as_leading_term(x, cdir=1) == atanh(2) + assert atanh(I*x - 2).as_leading_term(x, cdir=1) == -atanh(2) + assert atanh(-I*x - 2).as_leading_term(x, cdir=1) == -I*pi - atanh(2) + # Tests concerning im(ndir) == 0 + assert atanh(-I*x**2 + x - 2).as_leading_term(x, cdir=1) == -log(3)/2 - I*pi/2 + assert atanh(-I*x**2 + x - 2).as_leading_term(x, cdir=-1) == -log(3)/2 - I*pi/2 + + +def test_atanh_series(): + x = Symbol('x') + assert atanh(x).series(x, 0, 10) == \ + x + x**3/3 + x**5/5 + x**7/7 + x**9/9 + O(x**10) + + +def test_atanh_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert atanh(x + 1)._eval_nseries(x, 4, None, cdir=1) == -I*pi/2 + log(2)/2 - \ + log(x)/2 + x/4 - x**2/16 + x**3/48 + O(x**4) + assert atanh(x + 1)._eval_nseries(x, 4, None, cdir=-1) == I*pi/2 + log(2)/2 - \ + log(x)/2 + x/4 - x**2/16 + x**3/48 + O(x**4) + assert atanh(x - 1)._eval_nseries(x, 4, None, cdir=1) == -log(2)/2 + log(x)/2 + \ + x/4 + x**2/16 + x**3/48 + O(x**4) + assert atanh(x - 1)._eval_nseries(x, 4, None, cdir=-1) == -log(2)/2 + log(x)/2 + \ + x/4 + x**2/16 + x**3/48 + O(x**4) + # Tests concerning points lying on branch cuts + assert atanh(I*x + 2)._eval_nseries(x, 4, None, cdir=1) == I*pi + atanh(2) - \ + I*x/3 - 2*x**2/9 + 13*I*x**3/81 + O(x**4) + assert atanh(I*x + 2)._eval_nseries(x, 4, None, cdir=-1) == atanh(2) - I*x/3 - \ + 2*x**2/9 + 13*I*x**3/81 + O(x**4) + assert atanh(I*x - 2)._eval_nseries(x, 4, None, cdir=1) == -atanh(2) - I*x/3 + \ + 2*x**2/9 + 13*I*x**3/81 + O(x**4) + assert atanh(I*x - 2)._eval_nseries(x, 4, None, cdir=-1) == -atanh(2) - I*pi - \ + I*x/3 + 2*x**2/9 + 13*I*x**3/81 + O(x**4) + # Tests concerning im(ndir) == 0 + assert atanh(-I*x**2 + x - 2)._eval_nseries(x, 4, None) == -I*pi/2 - log(3)/2 - x/3 + \ + x**2*(-S(1)/4 + I/2) + x**2*(S(1)/36 - I/6) + x**3*(-S(1)/6 + I/2) + x**3*(S(1)/162 - I/18) + O(x**4) + + +def test_atanh_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: atanh(x).fdiff(2)) + + +def test_acoth(): + x = Symbol('x') + + #at specific points + assert acoth(0) == I*pi/2 + assert acoth(I) == -I*pi/4 + assert acoth(-I) == I*pi/4 + assert acoth(1) is oo + assert acoth(-1) is -oo + assert acoth(nan) is nan + + # at infinites + assert acoth(oo) == 0 + assert acoth(-oo) == 0 + assert acoth(I*oo) == 0 + assert acoth(-I*oo) == 0 + assert acoth(zoo) == 0 + + #properties + assert acoth(-x) == -acoth(x) + + assert acoth(I/sqrt(3)) == -I*pi/3 + assert acoth(-I/sqrt(3)) == I*pi/3 + assert acoth(I*sqrt(3)) == -I*pi/6 + assert acoth(-I*sqrt(3)) == I*pi/6 + assert acoth(I*(1 + sqrt(2))) == -pi*I/8 + assert acoth(-I*(sqrt(2) + 1)) == pi*I/8 + assert acoth(I*(1 - sqrt(2))) == pi*I*Rational(3, 8) + assert acoth(I*(sqrt(2) - 1)) == pi*I*Rational(-3, 8) + assert acoth(I*sqrt(5 + 2*sqrt(5))) == -I*pi/10 + assert acoth(-I*sqrt(5 + 2*sqrt(5))) == I*pi/10 + assert acoth(I*(2 + sqrt(3))) == -pi*I/12 + assert acoth(-I*(2 + sqrt(3))) == pi*I/12 + assert acoth(I*(2 - sqrt(3))) == pi*I*Rational(-5, 12) + assert acoth(I*(sqrt(3) - 2)) == pi*I*Rational(5, 12) + + # reality + assert acoth(S(2)).is_real is True + assert acoth(S(2)).is_finite is True + assert acoth(S(2)).is_extended_real is True + assert acoth(S(-2)).is_real is True + assert acoth(S(1)).is_real is False + assert acoth(S(1)).is_extended_real is True + assert acoth(S(-1)).is_real is False + assert acoth(symbols('y', real=True)).is_real is None + + # Symmetry + assert acoth(Rational(-1, 2)) == -acoth(S.Half) + + +def test_acoth_rewrite(): + x = Symbol('x') + assert acoth(x).rewrite(log) == (log(1 + 1/x) - log(1 - 1/x)) / 2 + assert acoth(x).rewrite(atanh) == atanh(1/x) + assert acoth(x).rewrite(asinh) == \ + x*sqrt(x**(-2))*asinh(sqrt(1/(x**2 - 1))) + I*pi*(sqrt((x - 1)/x)*sqrt(x/(x - 1)) - sqrt(x/(x + 1))*sqrt(1 + 1/x))/2 + + +def test_acoth_leading_term(): + x = Symbol('x') + # Tests concerning branch points + assert acoth(x + 1).as_leading_term(x, cdir=1) == -log(x)/2 + log(2)/2 + assert acoth(x + 1).as_leading_term(x, cdir=-1) == -log(x)/2 + log(2)/2 + assert acoth(x - 1).as_leading_term(x, cdir=1) == log(x)/2 - log(2)/2 + I*pi/2 + assert acoth(x - 1).as_leading_term(x, cdir=-1) == log(x)/2 - log(2)/2 - I*pi/2 + # Tests concerning points lying on branch cuts + assert acoth(x).as_leading_term(x, cdir=-1) == I*pi/2 + assert acoth(x).as_leading_term(x, cdir=1) == -I*pi/2 + assert acoth(I*x + 1/2).as_leading_term(x, cdir=1) == acoth(1/2) + assert acoth(-I*x + 1/2).as_leading_term(x, cdir=1) == acoth(1/2) + I*pi + assert acoth(I*x - 1/2).as_leading_term(x, cdir=1) == -I*pi - acoth(1/2) + assert acoth(-I*x - 1/2).as_leading_term(x, cdir=1) == -acoth(1/2) + # Tests concerning im(ndir) == 0 + assert acoth(-I*x**2 - x - S(1)/2).as_leading_term(x, cdir=1) == -log(3)/2 + I*pi/2 + assert acoth(-I*x**2 - x - S(1)/2).as_leading_term(x, cdir=-1) == -log(3)/2 + I*pi/2 + + +def test_acoth_series(): + x = Symbol('x') + assert acoth(x).series(x, 0, 10) == \ + -I*pi/2 + x + x**3/3 + x**5/5 + x**7/7 + x**9/9 + O(x**10) + + +def test_acoth_nseries(): + x = Symbol('x') + # Tests concerning branch points + assert acoth(x + 1)._eval_nseries(x, 4, None) == log(2)/2 - log(x)/2 + x/4 - \ + x**2/16 + x**3/48 + O(x**4) + assert acoth(x - 1)._eval_nseries(x, 4, None, cdir=1) == I*pi/2 - log(2)/2 + \ + log(x)/2 + x/4 + x**2/16 + x**3/48 + O(x**4) + assert acoth(x - 1)._eval_nseries(x, 4, None, cdir=-1) == -I*pi/2 - log(2)/2 + \ + log(x)/2 + x/4 + x**2/16 + x**3/48 + O(x**4) + # Tests concerning points lying on branch cuts + assert acoth(I*x + S(1)/2)._eval_nseries(x, 4, None, cdir=1) == acoth(S(1)/2) + \ + 4*I*x/3 - 8*x**2/9 - 112*I*x**3/81 + O(x**4) + assert acoth(I*x + S(1)/2)._eval_nseries(x, 4, None, cdir=-1) == I*pi + \ + acoth(S(1)/2) + 4*I*x/3 - 8*x**2/9 - 112*I*x**3/81 + O(x**4) + assert acoth(I*x - S(1)/2)._eval_nseries(x, 4, None, cdir=1) == -acoth(S(1)/2) - \ + I*pi + 4*I*x/3 + 8*x**2/9 - 112*I*x**3/81 + O(x**4) + assert acoth(I*x - S(1)/2)._eval_nseries(x, 4, None, cdir=-1) == -acoth(S(1)/2) + \ + 4*I*x/3 + 8*x**2/9 - 112*I*x**3/81 + O(x**4) + # Tests concerning im(ndir) == 0 + assert acoth(-I*x**2 - x - S(1)/2)._eval_nseries(x, 4, None) == I*pi/2 - log(3)/2 - \ + 4*x/3 + x**2*(-S(8)/9 + 2*I/3) - 2*I*x**2 + x**3*(S(104)/81 - 16*I/9) - 8*x**3/3 + O(x**4) + + +def test_acoth_fdiff(): + x = Symbol('x') + raises(ArgumentIndexError, lambda: acoth(x).fdiff(2)) + + +def test_inverses(): + x = Symbol('x') + assert sinh(x).inverse() == asinh + raises(AttributeError, lambda: cosh(x).inverse()) + assert tanh(x).inverse() == atanh + assert coth(x).inverse() == acoth + assert asinh(x).inverse() == sinh + assert acosh(x).inverse() == cosh + assert atanh(x).inverse() == tanh + assert acoth(x).inverse() == coth + assert asech(x).inverse() == sech + assert acsch(x).inverse() == csch + + +def test_leading_term(): + x = Symbol('x') + assert cosh(x).as_leading_term(x) == 1 + assert coth(x).as_leading_term(x) == 1/x + for func in [sinh, tanh]: + assert func(x).as_leading_term(x) == x + for func in [sinh, cosh, tanh, coth]: + for ar in (1/x, S.Half): + eq = func(ar) + assert eq.as_leading_term(x) == eq + for func in [csch, sech]: + eq = func(S.Half) + assert eq.as_leading_term(x) == eq + + +def test_complex(): + a, b = symbols('a,b', real=True) + z = a + b*I + for func in [sinh, cosh, tanh, coth, sech, csch]: + assert func(z).conjugate() == func(a - b*I) + for deep in [True, False]: + assert sinh(z).expand( + complex=True, deep=deep) == sinh(a)*cos(b) + I*cosh(a)*sin(b) + assert cosh(z).expand( + complex=True, deep=deep) == cosh(a)*cos(b) + I*sinh(a)*sin(b) + assert tanh(z).expand(complex=True, deep=deep) == sinh(a)*cosh( + a)/(cos(b)**2 + sinh(a)**2) + I*sin(b)*cos(b)/(cos(b)**2 + sinh(a)**2) + assert coth(z).expand(complex=True, deep=deep) == sinh(a)*cosh( + a)/(sin(b)**2 + sinh(a)**2) - I*sin(b)*cos(b)/(sin(b)**2 + sinh(a)**2) + assert csch(z).expand(complex=True, deep=deep) == cos(b) * sinh(a) / (sin(b)**2\ + *cosh(a)**2 + cos(b)**2 * sinh(a)**2) - I*sin(b) * cosh(a) / (sin(b)**2\ + *cosh(a)**2 + cos(b)**2 * sinh(a)**2) + assert sech(z).expand(complex=True, deep=deep) == cos(b) * cosh(a) / (sin(b)**2\ + *sinh(a)**2 + cos(b)**2 * cosh(a)**2) - I*sin(b) * sinh(a) / (sin(b)**2\ + *sinh(a)**2 + cos(b)**2 * cosh(a)**2) + + +def test_complex_2899(): + a, b = symbols('a,b', real=True) + for deep in [True, False]: + for func in [sinh, cosh, tanh, coth]: + assert func(a).expand(complex=True, deep=deep) == func(a) + + +def test_simplifications(): + x = Symbol('x') + assert sinh(asinh(x)) == x + assert sinh(acosh(x)) == sqrt(x - 1) * sqrt(x + 1) + assert sinh(atanh(x)) == x/sqrt(1 - x**2) + assert sinh(acoth(x)) == 1/(sqrt(x - 1) * sqrt(x + 1)) + + assert cosh(asinh(x)) == sqrt(1 + x**2) + assert cosh(acosh(x)) == x + assert cosh(atanh(x)) == 1/sqrt(1 - x**2) + assert cosh(acoth(x)) == x/(sqrt(x - 1) * sqrt(x + 1)) + + assert tanh(asinh(x)) == x/sqrt(1 + x**2) + assert tanh(acosh(x)) == sqrt(x - 1) * sqrt(x + 1) / x + assert tanh(atanh(x)) == x + assert tanh(acoth(x)) == 1/x + + assert coth(asinh(x)) == sqrt(1 + x**2)/x + assert coth(acosh(x)) == x/(sqrt(x - 1) * sqrt(x + 1)) + assert coth(atanh(x)) == 1/x + assert coth(acoth(x)) == x + + assert csch(asinh(x)) == 1/x + assert csch(acosh(x)) == 1/(sqrt(x - 1) * sqrt(x + 1)) + assert csch(atanh(x)) == sqrt(1 - x**2)/x + assert csch(acoth(x)) == sqrt(x - 1) * sqrt(x + 1) + + assert sech(asinh(x)) == 1/sqrt(1 + x**2) + assert sech(acosh(x)) == 1/x + assert sech(atanh(x)) == sqrt(1 - x**2) + assert sech(acoth(x)) == sqrt(x - 1) * sqrt(x + 1)/x + + +def test_issue_4136(): + assert cosh(asinh(Integer(3)/2)) == sqrt(Integer(13)/4) + + +def test_sinh_rewrite(): + x = Symbol('x') + assert sinh(x).rewrite(exp) == (exp(x) - exp(-x))/2 \ + == sinh(x).rewrite('tractable') + assert sinh(x).rewrite(cosh) == -I*cosh(x + I*pi/2) + tanh_half = tanh(S.Half*x) + assert sinh(x).rewrite(tanh) == 2*tanh_half/(1 - tanh_half**2) + coth_half = coth(S.Half*x) + assert sinh(x).rewrite(coth) == 2*coth_half/(coth_half**2 - 1) + + +def test_cosh_rewrite(): + x = Symbol('x') + assert cosh(x).rewrite(exp) == (exp(x) + exp(-x))/2 \ + == cosh(x).rewrite('tractable') + assert cosh(x).rewrite(sinh) == -I*sinh(x + I*pi/2, evaluate=False) + tanh_half = tanh(S.Half*x)**2 + assert cosh(x).rewrite(tanh) == (1 + tanh_half)/(1 - tanh_half) + coth_half = coth(S.Half*x)**2 + assert cosh(x).rewrite(coth) == (coth_half + 1)/(coth_half - 1) + + +def test_tanh_rewrite(): + x = Symbol('x') + assert tanh(x).rewrite(exp) == (exp(x) - exp(-x))/(exp(x) + exp(-x)) \ + == tanh(x).rewrite('tractable') + assert tanh(x).rewrite(sinh) == I*sinh(x)/sinh(I*pi/2 - x, evaluate=False) + assert tanh(x).rewrite(cosh) == I*cosh(I*pi/2 - x, evaluate=False)/cosh(x) + assert tanh(x).rewrite(coth) == 1/coth(x) + + +def test_coth_rewrite(): + x = Symbol('x') + assert coth(x).rewrite(exp) == (exp(x) + exp(-x))/(exp(x) - exp(-x)) \ + == coth(x).rewrite('tractable') + assert coth(x).rewrite(sinh) == -I*sinh(I*pi/2 - x, evaluate=False)/sinh(x) + assert coth(x).rewrite(cosh) == -I*cosh(x)/cosh(I*pi/2 - x, evaluate=False) + assert coth(x).rewrite(tanh) == 1/tanh(x) + + +def test_csch_rewrite(): + x = Symbol('x') + assert csch(x).rewrite(exp) == 1 / (exp(x)/2 - exp(-x)/2) \ + == csch(x).rewrite('tractable') + assert csch(x).rewrite(cosh) == I/cosh(x + I*pi/2, evaluate=False) + tanh_half = tanh(S.Half*x) + assert csch(x).rewrite(tanh) == (1 - tanh_half**2)/(2*tanh_half) + coth_half = coth(S.Half*x) + assert csch(x).rewrite(coth) == (coth_half**2 - 1)/(2*coth_half) + + +def test_sech_rewrite(): + x = Symbol('x') + assert sech(x).rewrite(exp) == 1 / (exp(x)/2 + exp(-x)/2) \ + == sech(x).rewrite('tractable') + assert sech(x).rewrite(sinh) == I/sinh(x + I*pi/2, evaluate=False) + tanh_half = tanh(S.Half*x)**2 + assert sech(x).rewrite(tanh) == (1 - tanh_half)/(1 + tanh_half) + coth_half = coth(S.Half*x)**2 + assert sech(x).rewrite(coth) == (coth_half - 1)/(coth_half + 1) + + +def test_derivs(): + x = Symbol('x') + assert coth(x).diff(x) == -sinh(x)**(-2) + assert sinh(x).diff(x) == cosh(x) + assert cosh(x).diff(x) == sinh(x) + assert tanh(x).diff(x) == -tanh(x)**2 + 1 + assert csch(x).diff(x) == -coth(x)*csch(x) + assert sech(x).diff(x) == -tanh(x)*sech(x) + assert acoth(x).diff(x) == 1/(-x**2 + 1) + assert asinh(x).diff(x) == 1/sqrt(x**2 + 1) + assert acosh(x).diff(x) == 1/(sqrt(x - 1)*sqrt(x + 1)) + assert acosh(x).diff(x) == acosh(x).rewrite(log).diff(x).together() + assert atanh(x).diff(x) == 1/(-x**2 + 1) + assert asech(x).diff(x) == -1/(x*sqrt(1 - x**2)) + assert acsch(x).diff(x) == -1/(x**2*sqrt(1 + x**(-2))) + + +def test_sinh_expansion(): + x, y = symbols('x,y') + assert sinh(x+y).expand(trig=True) == sinh(x)*cosh(y) + cosh(x)*sinh(y) + assert sinh(2*x).expand(trig=True) == 2*sinh(x)*cosh(x) + assert sinh(3*x).expand(trig=True).expand() == \ + sinh(x)**3 + 3*sinh(x)*cosh(x)**2 + + +def test_cosh_expansion(): + x, y = symbols('x,y') + assert cosh(x+y).expand(trig=True) == cosh(x)*cosh(y) + sinh(x)*sinh(y) + assert cosh(2*x).expand(trig=True) == cosh(x)**2 + sinh(x)**2 + assert cosh(3*x).expand(trig=True).expand() == \ + 3*sinh(x)**2*cosh(x) + cosh(x)**3 + +def test_cosh_positive(): + # See issue 11721 + # cosh(x) is positive for real values of x + k = symbols('k', real=True) + n = symbols('n', integer=True) + + assert cosh(k, evaluate=False).is_positive is True + assert cosh(k + 2*n*pi*I, evaluate=False).is_positive is True + assert cosh(I*pi/4, evaluate=False).is_positive is True + assert cosh(3*I*pi/4, evaluate=False).is_positive is False + +def test_cosh_nonnegative(): + k = symbols('k', real=True) + n = symbols('n', integer=True) + + assert cosh(k, evaluate=False).is_nonnegative is True + assert cosh(k + 2*n*pi*I, evaluate=False).is_nonnegative is True + assert cosh(I*pi/4, evaluate=False).is_nonnegative is True + assert cosh(3*I*pi/4, evaluate=False).is_nonnegative is False + assert cosh(S.Zero, evaluate=False).is_nonnegative is True + +def test_real_assumptions(): + z = Symbol('z', real=False) + assert sinh(z).is_real is None + assert cosh(z).is_real is None + assert tanh(z).is_real is None + assert sech(z).is_real is None + assert csch(z).is_real is None + assert coth(z).is_real is None + +def test_sign_assumptions(): + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + assert sinh(n).is_negative is True + assert sinh(p).is_positive is True + assert cosh(n).is_positive is True + assert cosh(p).is_positive is True + assert tanh(n).is_negative is True + assert tanh(p).is_positive is True + assert csch(n).is_negative is True + assert csch(p).is_positive is True + assert sech(n).is_positive is True + assert sech(p).is_positive is True + assert coth(n).is_negative is True + assert coth(p).is_positive is True + + +def test_issue_25847(): + x = Symbol('x') + + #atanh + assert atanh(sin(x)/x).as_leading_term(x) == atanh(sin(x)/x) + raises(PoleError, lambda: atanh(exp(1/x)).as_leading_term(x)) + + #asinh + assert asinh(sin(x)/x).as_leading_term(x) == log(1 + sqrt(2)) + raises(PoleError, lambda: asinh(exp(1/x)).as_leading_term(x)) + + #acosh + assert acosh(sin(x)/x).as_leading_term(x) == 0 + raises(PoleError, lambda: acosh(exp(1/x)).as_leading_term(x)) + + #acoth + assert acoth(sin(x)/x).as_leading_term(x) == acoth(sin(x)/x) + raises(PoleError, lambda: acoth(exp(1/x)).as_leading_term(x)) + + #asech + assert asech(sinh(x)/x).as_leading_term(x) == 0 + raises(PoleError, lambda: asech(exp(1/x)).as_leading_term(x)) + + #acsch + assert acsch(sin(x)/x).as_leading_term(x) == log(1 + sqrt(2)) + raises(PoleError, lambda: acsch(exp(1/x)).as_leading_term(x)) + + +def test_issue_25175(): + x = Symbol('x') + g1 = 2*acosh(1 + 2*x/3) - acosh(S(5)/3 - S(8)/3/(x + 4)) + g2 = 2*log(sqrt((x + 4)/3)*(sqrt(x + 3)+sqrt(x))**2/(2*sqrt(x + 3) + sqrt(x))) + assert (g1 - g2).series(x) == O(x**6) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_integers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_integers.py new file mode 100644 index 0000000000000000000000000000000000000000..a48ad2ac24c4a857d57b2f24e3308ac90078a9b1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_integers.py @@ -0,0 +1,688 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.core.numbers import (E, Float, I, Rational, Integer, nan, oo, pi, zoo) +from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.integers import (ceiling, floor, frac) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin, cos, tan, asin +from sympy.polys.rootoftools import RootOf, CRootOf +from sympy import Integers +from sympy.sets.sets import Interval +from sympy.sets.fancysets import ImageSet +from sympy.core.function import Lambda + +from sympy.core.expr import unchanged +from sympy.testing.pytest import XFAIL, raises + +x = Symbol('x') +i = Symbol('i', imaginary=True) +y = Symbol('y', real=True) +k, n = symbols('k,n', integer=True) +b = Symbol('b', real=True, noninteger=True) +m = Symbol('m', positive=True) + + +def test_floor(): + + assert floor(nan) is nan + + assert floor(oo) is oo + assert floor(-oo) is -oo + assert floor(zoo) is zoo + + assert floor(0) == 0 + + assert floor(1) == 1 + assert floor(-1) == -1 + + assert floor(I*log(asin(5)/abs(asin(5)))) == 0 + assert floor(-I*log(asin(7)/abs(asin(7)))) == -2 + + assert floor(E) == 2 + assert floor(-E) == -3 + + assert floor(2*E) == 5 + assert floor(-2*E) == -6 + + assert floor(pi) == 3 + assert floor(-pi) == -4 + + assert floor(S.Half) == 0 + assert floor(Rational(-1, 2)) == -1 + + assert floor(Rational(7, 3)) == 2 + assert floor(Rational(-7, 3)) == -3 + assert floor(-Rational(7, 3)) == -3 + + assert floor(Float(17.0)) == 17 + assert floor(-Float(17.0)) == -17 + + assert floor(Float(7.69)) == 7 + assert floor(-Float(7.69)) == -8 + + assert floor(1/(m+1)) == S.Zero + assert floor((m+2)/(m+1)) == S.One + assert floor(-1/(m+1)) == S.NegativeOne + assert floor((m+2)/(-m-1)) == Integer(-2) + + assert floor(I) == I + assert floor(-I) == -I + e = floor(i) + assert e.func is floor and e.args[0] == i + + assert floor(oo*I) == oo*I + assert floor(-oo*I) == -oo*I + assert floor(exp(I*pi/4)*oo) == exp(I*pi/4)*oo + + assert floor(2*I) == 2*I + assert floor(-2*I) == -2*I + + assert floor(I/2) == 0 + assert floor(-I/2) == -I + + assert floor(E + 17) == 19 + assert floor(pi + 2) == 5 + + assert floor(E + pi) == 5 + assert floor(I + pi) == 3 + I + + assert floor(floor(pi)) == 3 + assert floor(floor(y)) == floor(y) + assert floor(floor(x)) == floor(x) + + assert unchanged(floor, x) + assert unchanged(floor, 2*x) + assert unchanged(floor, k*x) + + assert floor(k) == k + assert floor(2*k) == 2*k + assert floor(k*n) == k*n + + assert unchanged(floor, k/2) + + assert unchanged(floor, x + y) + + assert floor(x + 3) == floor(x) + 3 + assert floor(x + k) == floor(x) + k + + assert floor(y + 3) == floor(y) + 3 + assert floor(y + k) == floor(y) + k + + assert floor(3 + I*y + pi) == 6 + floor(y)*I + + assert floor(k + n) == k + n + + assert unchanged(floor, x*I) + assert floor(k*I) == k*I + + assert floor(Rational(23, 10) - E*I) == 2 - 3*I + + assert floor(sin(1)) == 0 + assert floor(sin(-1)) == -1 + + assert floor(exp(2)) == 7 + + assert floor(log(8)/log(2)) != 2 + assert int(floor(log(8)/log(2)).evalf(chop=True)) == 3 + + assert floor(factorial(50)/exp(1)) == \ + 11188719610782480504630258070757734324011354208865721592720336800 + + assert (floor(y) < y).is_Relational + assert (floor(y) <= y) == True + assert (floor(y) > y) == False + assert (floor(y) >= y).is_Relational + assert (floor(x) <= x).is_Relational # x could be non-real + assert (floor(x) > x).is_Relational + assert (floor(x) <= y).is_Relational # arg is not same as rhs + assert (floor(x) > y).is_Relational + assert (floor(y) <= oo) == True + assert (floor(y) < oo) == True + assert (floor(y) >= -oo) == True + assert (floor(y) > -oo) == True + assert (floor(b) < b) == True + assert (floor(b) <= b) == True + assert (floor(b) > b) == False + assert (floor(b) >= b) == False + + assert floor(y).rewrite(frac) == y - frac(y) + assert floor(y).rewrite(ceiling) == -ceiling(-y) + assert floor(y).rewrite(frac).subs(y, -pi) == floor(-pi) + assert floor(y).rewrite(frac).subs(y, E) == floor(E) + assert floor(y).rewrite(ceiling).subs(y, E) == -ceiling(-E) + assert floor(y).rewrite(ceiling).subs(y, -pi) == -ceiling(pi) + + assert Eq(floor(y), y - frac(y)) + assert Eq(floor(y), -ceiling(-y)) + + neg = Symbol('neg', negative=True) + nn = Symbol('nn', nonnegative=True) + pos = Symbol('pos', positive=True) + np = Symbol('np', nonpositive=True) + + assert (floor(neg) < 0) == True + assert (floor(neg) <= 0) == True + assert (floor(neg) > 0) == False + assert (floor(neg) >= 0) == False + assert (floor(neg) <= -1) == True + assert (floor(neg) >= -3) == (neg >= -3) + assert (floor(neg) < 5) == (neg < 5) + + assert (floor(nn) < 0) == False + assert (floor(nn) >= 0) == True + + assert (floor(pos) < 0) == False + assert (floor(pos) <= 0) == (pos < 1) + assert (floor(pos) > 0) == (pos >= 1) + assert (floor(pos) >= 0) == True + assert (floor(pos) >= 3) == (pos >= 3) + + assert (floor(np) <= 0) == True + assert (floor(np) > 0) == False + + assert floor(neg).is_negative == True + assert floor(neg).is_nonnegative == False + assert floor(nn).is_negative == False + assert floor(nn).is_nonnegative == True + assert floor(pos).is_negative == False + assert floor(pos).is_nonnegative == True + assert floor(np).is_negative is None + assert floor(np).is_nonnegative is None + + assert (floor(7, evaluate=False) >= 7) == True + assert (floor(7, evaluate=False) > 7) == False + assert (floor(7, evaluate=False) <= 7) == True + assert (floor(7, evaluate=False) < 7) == False + + assert (floor(7, evaluate=False) >= 6) == True + assert (floor(7, evaluate=False) > 6) == True + assert (floor(7, evaluate=False) <= 6) == False + assert (floor(7, evaluate=False) < 6) == False + + assert (floor(7, evaluate=False) >= 8) == False + assert (floor(7, evaluate=False) > 8) == False + assert (floor(7, evaluate=False) <= 8) == True + assert (floor(7, evaluate=False) < 8) == True + + assert (floor(x) <= 5.5) == Le(floor(x), 5.5, evaluate=False) + assert (floor(x) >= -3.2) == Ge(floor(x), -3.2, evaluate=False) + assert (floor(x) < 2.9) == Lt(floor(x), 2.9, evaluate=False) + assert (floor(x) > -1.7) == Gt(floor(x), -1.7, evaluate=False) + + assert (floor(y) <= 5.5) == (y < 6) + assert (floor(y) >= -3.2) == (y >= -3) + assert (floor(y) < 2.9) == (y < 3) + assert (floor(y) > -1.7) == (y >= -1) + + assert (floor(y) <= n) == (y < n + 1) + assert (floor(y) >= n) == (y >= n) + assert (floor(y) < n) == (y < n) + assert (floor(y) > n) == (y >= n + 1) + + assert floor(RootOf(x**3 - 27*x, 2)) == 5 + + +def test_ceiling(): + + assert ceiling(nan) is nan + + assert ceiling(oo) is oo + assert ceiling(-oo) is -oo + assert ceiling(zoo) is zoo + + assert ceiling(0) == 0 + + assert ceiling(1) == 1 + assert ceiling(-1) == -1 + + assert ceiling(I*log(asin(5)/abs(asin(5)))) == 1 + assert ceiling(-I*log(asin(7)/abs(asin(7)))) == -1 + + assert ceiling(E) == 3 + assert ceiling(-E) == -2 + + assert ceiling(2*E) == 6 + assert ceiling(-2*E) == -5 + + assert ceiling(pi) == 4 + assert ceiling(-pi) == -3 + + assert ceiling(S.Half) == 1 + assert ceiling(Rational(-1, 2)) == 0 + + assert ceiling(Rational(7, 3)) == 3 + assert ceiling(-Rational(7, 3)) == -2 + + assert ceiling(Float(17.0)) == 17 + assert ceiling(-Float(17.0)) == -17 + + assert ceiling(Float(7.69)) == 8 + assert ceiling(-Float(7.69)) == -7 + + assert ceiling(1/(m+1)) == S.One + assert ceiling((m+2)/(m+1)) == Integer(2) + assert ceiling(-1/(m+1)) == S.Zero + assert ceiling((m+2)/(-m-1)) == S.NegativeOne + + assert ceiling(I) == I + assert ceiling(-I) == -I + e = ceiling(i) + assert e.func is ceiling and e.args[0] == i + + assert ceiling(oo*I) == oo*I + assert ceiling(-oo*I) == -oo*I + assert ceiling(exp(I*pi/4)*oo) == exp(I*pi/4)*oo + + assert ceiling(2*I) == 2*I + assert ceiling(-2*I) == -2*I + + assert ceiling(I/2) == I + assert ceiling(-I/2) == 0 + + assert ceiling(E + 17) == 20 + assert ceiling(pi + 2) == 6 + + assert ceiling(E + pi) == 6 + assert ceiling(I + pi) == I + 4 + + assert ceiling(ceiling(pi)) == 4 + assert ceiling(ceiling(y)) == ceiling(y) + assert ceiling(ceiling(x)) == ceiling(x) + + assert unchanged(ceiling, x) + assert unchanged(ceiling, 2*x) + assert unchanged(ceiling, k*x) + + assert ceiling(k) == k + assert ceiling(2*k) == 2*k + assert ceiling(k*n) == k*n + + assert unchanged(ceiling, k/2) + + assert unchanged(ceiling, x + y) + + assert ceiling(x + 3) == ceiling(x) + 3 + assert ceiling(x + 3.0) == ceiling(x) + 3 + assert ceiling(x + 3.0*I) == ceiling(x) + 3*I + assert ceiling(x + k) == ceiling(x) + k + + assert ceiling(y + 3) == ceiling(y) + 3 + assert ceiling(y + k) == ceiling(y) + k + + assert ceiling(3 + pi + y*I) == 7 + ceiling(y)*I + + assert ceiling(k + n) == k + n + + assert unchanged(ceiling, x*I) + assert ceiling(k*I) == k*I + + assert ceiling(Rational(23, 10) - E*I) == 3 - 2*I + + assert ceiling(sin(1)) == 1 + assert ceiling(sin(-1)) == 0 + + assert ceiling(exp(2)) == 8 + + assert ceiling(-log(8)/log(2)) != -2 + assert int(ceiling(-log(8)/log(2)).evalf(chop=True)) == -3 + + assert ceiling(factorial(50)/exp(1)) == \ + 11188719610782480504630258070757734324011354208865721592720336801 + + assert (ceiling(y) >= y) == True + assert (ceiling(y) > y).is_Relational + assert (ceiling(y) < y) == False + assert (ceiling(y) <= y).is_Relational + assert (ceiling(x) >= x).is_Relational # x could be non-real + assert (ceiling(x) < x).is_Relational + assert (ceiling(x) >= y).is_Relational # arg is not same as rhs + assert (ceiling(x) < y).is_Relational + assert (ceiling(y) >= -oo) == True + assert (ceiling(y) > -oo) == True + assert (ceiling(y) <= oo) == True + assert (ceiling(y) < oo) == True + assert (ceiling(b) < b) == False + assert (ceiling(b) <= b) == False + assert (ceiling(b) > b) == True + assert (ceiling(b) >= b) == True + + assert ceiling(y).rewrite(floor) == -floor(-y) + assert ceiling(y).rewrite(frac) == y + frac(-y) + assert ceiling(y).rewrite(floor).subs(y, -pi) == -floor(pi) + assert ceiling(y).rewrite(floor).subs(y, E) == -floor(-E) + assert ceiling(y).rewrite(frac).subs(y, pi) == ceiling(pi) + assert ceiling(y).rewrite(frac).subs(y, -E) == ceiling(-E) + + assert Eq(ceiling(y), y + frac(-y)) + assert Eq(ceiling(y), -floor(-y)) + + neg = Symbol('neg', negative=True) + nn = Symbol('nn', nonnegative=True) + pos = Symbol('pos', positive=True) + np = Symbol('np', nonpositive=True) + + assert (ceiling(neg) <= 0) == True + assert (ceiling(neg) < 0) == (neg <= -1) + assert (ceiling(neg) > 0) == False + assert (ceiling(neg) >= 0) == (neg > -1) + assert (ceiling(neg) > -3) == (neg > -3) + assert (ceiling(neg) <= 10) == (neg <= 10) + + assert (ceiling(nn) < 0) == False + assert (ceiling(nn) >= 0) == True + + assert (ceiling(pos) < 0) == False + assert (ceiling(pos) <= 0) == False + assert (ceiling(pos) > 0) == True + assert (ceiling(pos) >= 0) == True + assert (ceiling(pos) >= 1) == True + assert (ceiling(pos) > 5) == (pos > 5) + + assert (ceiling(np) <= 0) == True + assert (ceiling(np) > 0) == False + + assert ceiling(neg).is_positive == False + assert ceiling(neg).is_nonpositive == True + assert ceiling(nn).is_positive is None + assert ceiling(nn).is_nonpositive is None + assert ceiling(pos).is_positive == True + assert ceiling(pos).is_nonpositive == False + assert ceiling(np).is_positive == False + assert ceiling(np).is_nonpositive == True + + assert (ceiling(7, evaluate=False) >= 7) == True + assert (ceiling(7, evaluate=False) > 7) == False + assert (ceiling(7, evaluate=False) <= 7) == True + assert (ceiling(7, evaluate=False) < 7) == False + + assert (ceiling(7, evaluate=False) >= 6) == True + assert (ceiling(7, evaluate=False) > 6) == True + assert (ceiling(7, evaluate=False) <= 6) == False + assert (ceiling(7, evaluate=False) < 6) == False + + assert (ceiling(7, evaluate=False) >= 8) == False + assert (ceiling(7, evaluate=False) > 8) == False + assert (ceiling(7, evaluate=False) <= 8) == True + assert (ceiling(7, evaluate=False) < 8) == True + + assert (ceiling(x) <= 5.5) == Le(ceiling(x), 5.5, evaluate=False) + assert (ceiling(x) >= -3.2) == Ge(ceiling(x), -3.2, evaluate=False) + assert (ceiling(x) < 2.9) == Lt(ceiling(x), 2.9, evaluate=False) + assert (ceiling(x) > -1.7) == Gt(ceiling(x), -1.7, evaluate=False) + + assert (ceiling(y) <= 5.5) == (y <= 5) + assert (ceiling(y) >= -3.2) == (y > -4) + assert (ceiling(y) < 2.9) == (y <= 2) + assert (ceiling(y) > -1.7) == (y > -2) + + assert (ceiling(y) <= n) == (y <= n) + assert (ceiling(y) >= n) == (y > n - 1) + assert (ceiling(y) < n) == (y <= n - 1) + assert (ceiling(y) > n) == (y > n) + + assert ceiling(RootOf(x**3 - 27*x, 2)) == 6 + s = ImageSet(Lambda(n, n + (CRootOf(x**5 - x**2 + 1, 0))), Integers) + f = CRootOf(x**5 - x**2 + 1, 0) + s = ImageSet(Lambda(n, n + f), Integers) + assert s.intersect(Interval(-10, 10)) == {i + f for i in range(-9, 11)} + + +def test_frac(): + assert isinstance(frac(x), frac) + assert frac(oo) == AccumBounds(0, 1) + assert frac(-oo) == AccumBounds(0, 1) + assert frac(zoo) is nan + + assert frac(n) == 0 + assert frac(nan) is nan + assert frac(Rational(4, 3)) == Rational(1, 3) + assert frac(-Rational(4, 3)) == Rational(2, 3) + assert frac(Rational(-4, 3)) == Rational(2, 3) + + r = Symbol('r', real=True) + assert frac(I*r) == I*frac(r) + assert frac(1 + I*r) == I*frac(r) + assert frac(0.5 + I*r) == 0.5 + I*frac(r) + assert frac(n + I*r) == I*frac(r) + assert frac(n + I*k) == 0 + assert unchanged(frac, x + I*x) + assert frac(x + I*n) == frac(x) + + assert frac(x).rewrite(floor) == x - floor(x) + assert frac(x).rewrite(ceiling) == x + ceiling(-x) + assert frac(y).rewrite(floor).subs(y, pi) == frac(pi) + assert frac(y).rewrite(floor).subs(y, -E) == frac(-E) + assert frac(y).rewrite(ceiling).subs(y, -pi) == frac(-pi) + assert frac(y).rewrite(ceiling).subs(y, E) == frac(E) + + assert Eq(frac(y), y - floor(y)) + assert Eq(frac(y), y + ceiling(-y)) + + r = Symbol('r', real=True) + p_i = Symbol('p_i', integer=True, positive=True) + n_i = Symbol('p_i', integer=True, negative=True) + np_i = Symbol('np_i', integer=True, nonpositive=True) + nn_i = Symbol('nn_i', integer=True, nonnegative=True) + p_r = Symbol('p_r', positive=True) + n_r = Symbol('n_r', negative=True) + np_r = Symbol('np_r', real=True, nonpositive=True) + nn_r = Symbol('nn_r', real=True, nonnegative=True) + + # Real frac argument, integer rhs + assert frac(r) <= p_i + assert not frac(r) <= n_i + assert (frac(r) <= np_i).has(Le) + assert (frac(r) <= nn_i).has(Le) + assert frac(r) < p_i + assert not frac(r) < n_i + assert not frac(r) < np_i + assert (frac(r) < nn_i).has(Lt) + assert not frac(r) >= p_i + assert frac(r) >= n_i + assert frac(r) >= np_i + assert (frac(r) >= nn_i).has(Ge) + assert not frac(r) > p_i + assert frac(r) > n_i + assert (frac(r) > np_i).has(Gt) + assert (frac(r) > nn_i).has(Gt) + + assert not Eq(frac(r), p_i) + assert not Eq(frac(r), n_i) + assert Eq(frac(r), np_i).has(Eq) + assert Eq(frac(r), nn_i).has(Eq) + + assert Ne(frac(r), p_i) + assert Ne(frac(r), n_i) + assert Ne(frac(r), np_i).has(Ne) + assert Ne(frac(r), nn_i).has(Ne) + + + # Real frac argument, real rhs + assert (frac(r) <= p_r).has(Le) + assert not frac(r) <= n_r + assert (frac(r) <= np_r).has(Le) + assert (frac(r) <= nn_r).has(Le) + assert (frac(r) < p_r).has(Lt) + assert not frac(r) < n_r + assert not frac(r) < np_r + assert (frac(r) < nn_r).has(Lt) + assert (frac(r) >= p_r).has(Ge) + assert frac(r) >= n_r + assert frac(r) >= np_r + assert (frac(r) >= nn_r).has(Ge) + assert (frac(r) > p_r).has(Gt) + assert frac(r) > n_r + assert (frac(r) > np_r).has(Gt) + assert (frac(r) > nn_r).has(Gt) + + assert not Eq(frac(r), n_r) + assert Eq(frac(r), p_r).has(Eq) + assert Eq(frac(r), np_r).has(Eq) + assert Eq(frac(r), nn_r).has(Eq) + + assert Ne(frac(r), p_r).has(Ne) + assert Ne(frac(r), n_r) + assert Ne(frac(r), np_r).has(Ne) + assert Ne(frac(r), nn_r).has(Ne) + + # Real frac argument, +/- oo rhs + assert frac(r) < oo + assert frac(r) <= oo + assert not frac(r) > oo + assert not frac(r) >= oo + + assert not frac(r) < -oo + assert not frac(r) <= -oo + assert frac(r) > -oo + assert frac(r) >= -oo + + assert frac(r) < 1 + assert frac(r) <= 1 + assert not frac(r) > 1 + assert not frac(r) >= 1 + + assert not frac(r) < 0 + assert (frac(r) <= 0).has(Le) + assert (frac(r) > 0).has(Gt) + assert frac(r) >= 0 + + # Some test for numbers + assert frac(r) <= sqrt(2) + assert (frac(r) <= sqrt(3) - sqrt(2)).has(Le) + assert not frac(r) <= sqrt(2) - sqrt(3) + assert not frac(r) >= sqrt(2) + assert (frac(r) >= sqrt(3) - sqrt(2)).has(Ge) + assert frac(r) >= sqrt(2) - sqrt(3) + + assert not Eq(frac(r), sqrt(2)) + assert Eq(frac(r), sqrt(3) - sqrt(2)).has(Eq) + assert not Eq(frac(r), sqrt(2) - sqrt(3)) + assert Ne(frac(r), sqrt(2)) + assert Ne(frac(r), sqrt(3) - sqrt(2)).has(Ne) + assert Ne(frac(r), sqrt(2) - sqrt(3)) + + assert frac(p_i, evaluate=False).is_zero + assert frac(p_i, evaluate=False).is_finite + assert frac(p_i, evaluate=False).is_integer + assert frac(p_i, evaluate=False).is_real + assert frac(r).is_finite + assert frac(r).is_real + assert frac(r).is_zero is None + assert frac(r).is_integer is None + + assert frac(oo).is_finite + assert frac(oo).is_real + + +def test_series(): + x, y = symbols('x,y') + assert floor(x).nseries(x, y, 100) == floor(y) + assert ceiling(x).nseries(x, y, 100) == ceiling(y) + assert floor(x).nseries(x, pi, 100) == 3 + assert ceiling(x).nseries(x, pi, 100) == 4 + assert floor(x).nseries(x, 0, 100) == 0 + assert ceiling(x).nseries(x, 0, 100) == 1 + assert floor(-x).nseries(x, 0, 100) == -1 + assert ceiling(-x).nseries(x, 0, 100) == 0 + + +def test_issue_14355(): + # This test checks the leading term and series for the floor and ceil + # function when arg0 evaluates to S.NaN. + assert floor((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = 1) == -2 + assert floor((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = -1) == -1 + assert floor((cos(x) - 1)/x).as_leading_term(x, cdir = 1) == -1 + assert floor((cos(x) - 1)/x).as_leading_term(x, cdir = -1) == 0 + assert floor(sin(x)/x).as_leading_term(x, cdir = 1) == 0 + assert floor(sin(x)/x).as_leading_term(x, cdir = -1) == 0 + assert floor(-tan(x)/x).as_leading_term(x, cdir = 1) == -2 + assert floor(-tan(x)/x).as_leading_term(x, cdir = -1) == -2 + assert floor(sin(x)/x/3).as_leading_term(x, cdir = 1) == 0 + assert floor(sin(x)/x/3).as_leading_term(x, cdir = -1) == 0 + assert ceiling((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = 1) == -1 + assert ceiling((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = -1) == 0 + assert ceiling((cos(x) - 1)/x).as_leading_term(x, cdir = 1) == 0 + assert ceiling((cos(x) - 1)/x).as_leading_term(x, cdir = -1) == 1 + assert ceiling(sin(x)/x).as_leading_term(x, cdir = 1) == 1 + assert ceiling(sin(x)/x).as_leading_term(x, cdir = -1) == 1 + assert ceiling(-tan(x)/x).as_leading_term(x, cdir = 1) == -1 + assert ceiling(-tan(x)/x).as_leading_term(x, cdir = 1) == -1 + assert ceiling(sin(x)/x/3).as_leading_term(x, cdir = 1) == 1 + assert ceiling(sin(x)/x/3).as_leading_term(x, cdir = -1) == 1 + # test for series + assert floor(sin(x)/x).series(x, 0, 100, cdir = 1) == 0 + assert floor(sin(x)/x).series(x, 0, 100, cdir = 1) == 0 + assert floor((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = 1) == -2 + assert floor((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = -1) == -1 + assert ceiling(sin(x)/x).series(x, 0, 100, cdir = 1) == 1 + assert ceiling(sin(x)/x).series(x, 0, 100, cdir = -1) == 1 + assert ceiling((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = 1) == -1 + assert ceiling((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = -1) == 0 + + +def test_frac_leading_term(): + assert frac(x).as_leading_term(x) == x + assert frac(x).as_leading_term(x, cdir = 1) == x + assert frac(x).as_leading_term(x, cdir = -1) == 1 + assert frac(x + S.Half).as_leading_term(x, cdir = 1) == S.Half + assert frac(x + S.Half).as_leading_term(x, cdir = -1) == S.Half + assert frac(-2*x + 1).as_leading_term(x, cdir = 1) == S.One + assert frac(-2*x + 1).as_leading_term(x, cdir = -1) == -2*x + assert frac(sin(x) + 5).as_leading_term(x, cdir = 1) == x + assert frac(sin(x) + 5).as_leading_term(x, cdir = -1) == S.One + assert frac(sin(x**2) + 5).as_leading_term(x, cdir = 1) == x**2 + assert frac(sin(x**2) + 5).as_leading_term(x, cdir = -1) == x**2 + + +@XFAIL +def test_issue_4149(): + assert floor(3 + pi*I + y*I) == 3 + floor(pi + y)*I + assert floor(3*I + pi*I + y*I) == floor(3 + pi + y)*I + assert floor(3 + E + pi*I + y*I) == 5 + floor(pi + y)*I + + +def test_issue_21651(): + k = Symbol('k', positive=True, integer=True) + exp = 2*2**(-k) + assert isinstance(floor(exp), floor) + + +def test_issue_11207(): + assert floor(floor(x)) == floor(x) + assert floor(ceiling(x)) == ceiling(x) + assert ceiling(floor(x)) == floor(x) + assert ceiling(ceiling(x)) == ceiling(x) + + +def test_nested_floor_ceiling(): + assert floor(-floor(ceiling(x**3)/y)) == -floor(ceiling(x**3)/y) + assert ceiling(-floor(ceiling(x**3)/y)) == -floor(ceiling(x**3)/y) + assert floor(ceiling(-floor(x**Rational(7, 2)/y))) == -floor(x**Rational(7, 2)/y) + assert -ceiling(-ceiling(floor(x)/y)) == ceiling(floor(x)/y) + +def test_issue_18689(): + assert floor(floor(floor(x)) + 3) == floor(x) + 3 + assert ceiling(ceiling(ceiling(x)) + 1) == ceiling(x) + 1 + assert ceiling(ceiling(floor(x)) + 3) == floor(x) + 3 + +def test_issue_18421(): + assert floor(float(0)) is S.Zero + assert ceiling(float(0)) is S.Zero + +def test_issue_25230(): + a = Symbol('a', real = True) + b = Symbol('b', positive = True) + c = Symbol('c', negative = True) + raises(NotImplementedError, lambda: floor(x/a).as_leading_term(x, cdir = 1)) + raises(NotImplementedError, lambda: ceiling(x/a).as_leading_term(x, cdir = 1)) + assert floor(x/b).as_leading_term(x, cdir = 1) == 0 + assert floor(x/b).as_leading_term(x, cdir = -1) == -1 + assert floor(x/c).as_leading_term(x, cdir = 1) == -1 + assert floor(x/c).as_leading_term(x, cdir = -1) == 0 + assert ceiling(x/b).as_leading_term(x, cdir = 1) == 1 + assert ceiling(x/b).as_leading_term(x, cdir = -1) == 0 + assert ceiling(x/c).as_leading_term(x, cdir = 1) == 0 + assert ceiling(x/c).as_leading_term(x, cdir = -1) == 1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_interface.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_interface.py new file mode 100644 index 0000000000000000000000000000000000000000..6ae2f78b50bea24c64079066076971e315660d69 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_interface.py @@ -0,0 +1,82 @@ +# This test file tests the SymPy function interface, that people use to create +# their own new functions. It should be as easy as possible. +# +# We test that it works with both Function and DefinedFunction. New code should +# use DefinedFunction because it has better type inference. Old code still +# using Function should continue to work though. +from sympy.core.function import Function, DefinedFunction +from sympy.core.sympify import sympify +from sympy.functions.elementary.hyperbolic import tanh +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.series.limits import limit +from sympy.abc import x + + +def test_function_series1(): + """Create our new "sin" function.""" + + for F in [Function, DefinedFunction]: + + class my_function(F): + + def fdiff(self, argindex=1): + return cos(self.args[0]) + + @classmethod + def eval(cls, arg): + arg = sympify(arg) + if arg == 0: + return sympify(0) + + #Test that the taylor series is correct + assert my_function(x).series(x, 0, 10) == sin(x).series(x, 0, 10) + assert limit(my_function(x)/x, x, 0) == 1 + + +def test_function_series2(): + """Create our new "cos" function.""" + + for F in [Function, DefinedFunction]: + + class my_function2(F): + + def fdiff(self, argindex=1): + return -sin(self.args[0]) + + @classmethod + def eval(cls, arg): + arg = sympify(arg) + if arg == 0: + return sympify(1) + + #Test that the taylor series is correct + assert my_function2(x).series(x, 0, 10) == cos(x).series(x, 0, 10) + + +def test_function_series3(): + """ + Test our easy "tanh" function. + + This test tests two things: + * that the Function interface works as expected and it's easy to use + * that the general algorithm for the series expansion works even when the + derivative is defined recursively in terms of the original function, + since tanh(x).diff(x) == 1-tanh(x)**2 + """ + + for F in [Function, DefinedFunction]: + + class mytanh(F): + + def fdiff(self, argindex=1): + return 1 - mytanh(self.args[0])**2 + + @classmethod + def eval(cls, arg): + arg = sympify(arg) + if arg == 0: + return sympify(0) + + e = tanh(x) + f = mytanh(x) + assert e.series(x, 0, 6) == f.series(x, 0, 6) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_miscellaneous.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_miscellaneous.py new file mode 100644 index 0000000000000000000000000000000000000000..374c4fb50eaae54a9884015c124c245385e1761e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_miscellaneous.py @@ -0,0 +1,504 @@ +import itertools as it + +from sympy.core.expr import unchanged +from sympy.core.function import Function +from sympy.core.numbers import I, oo, Rational +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.external import import_module +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.integers import floor, ceiling +from sympy.functions.elementary.miscellaneous import (sqrt, cbrt, root, Min, + Max, real_root, Rem) +from sympy.functions.elementary.trigonometric import cos, sin +from sympy.functions.special.delta_functions import Heaviside + +from sympy.utilities.lambdify import lambdify +from sympy.testing.pytest import raises, skip, ignore_warnings + +def test_Min(): + from sympy.abc import x, y, z + n = Symbol('n', negative=True) + n_ = Symbol('n_', negative=True) + nn = Symbol('nn', nonnegative=True) + nn_ = Symbol('nn_', nonnegative=True) + p = Symbol('p', positive=True) + p_ = Symbol('p_', positive=True) + np = Symbol('np', nonpositive=True) + np_ = Symbol('np_', nonpositive=True) + r = Symbol('r', real=True) + + assert Min(5, 4) == 4 + assert Min(-oo, -oo) is -oo + assert Min(-oo, n) is -oo + assert Min(n, -oo) is -oo + assert Min(-oo, np) is -oo + assert Min(np, -oo) is -oo + assert Min(-oo, 0) is -oo + assert Min(0, -oo) is -oo + assert Min(-oo, nn) is -oo + assert Min(nn, -oo) is -oo + assert Min(-oo, p) is -oo + assert Min(p, -oo) is -oo + assert Min(-oo, oo) is -oo + assert Min(oo, -oo) is -oo + assert Min(n, n) == n + assert unchanged(Min, n, np) + assert Min(np, n) == Min(n, np) + assert Min(n, 0) == n + assert Min(0, n) == n + assert Min(n, nn) == n + assert Min(nn, n) == n + assert Min(n, p) == n + assert Min(p, n) == n + assert Min(n, oo) == n + assert Min(oo, n) == n + assert Min(np, np) == np + assert Min(np, 0) == np + assert Min(0, np) == np + assert Min(np, nn) == np + assert Min(nn, np) == np + assert Min(np, p) == np + assert Min(p, np) == np + assert Min(np, oo) == np + assert Min(oo, np) == np + assert Min(0, 0) == 0 + assert Min(0, nn) == 0 + assert Min(nn, 0) == 0 + assert Min(0, p) == 0 + assert Min(p, 0) == 0 + assert Min(0, oo) == 0 + assert Min(oo, 0) == 0 + assert Min(nn, nn) == nn + assert unchanged(Min, nn, p) + assert Min(p, nn) == Min(nn, p) + assert Min(nn, oo) == nn + assert Min(oo, nn) == nn + assert Min(p, p) == p + assert Min(p, oo) == p + assert Min(oo, p) == p + assert Min(oo, oo) is oo + + assert Min(n, n_).func is Min + assert Min(nn, nn_).func is Min + assert Min(np, np_).func is Min + assert Min(p, p_).func is Min + + # lists + assert Min() is S.Infinity + assert Min(x) == x + assert Min(x, y) == Min(y, x) + assert Min(x, y, z) == Min(z, y, x) + assert Min(x, Min(y, z)) == Min(z, y, x) + assert Min(x, Max(y, -oo)) == Min(x, y) + assert Min(p, oo, n, p, p, p_) == n + assert Min(p_, n_, p) == n_ + assert Min(n, oo, -7, p, p, 2) == Min(n, -7) + assert Min(2, x, p, n, oo, n_, p, 2, -2, -2) == Min(-2, x, n, n_) + assert Min(0, x, 1, y) == Min(0, x, y) + assert Min(1000, 100, -100, x, p, n) == Min(n, x, -100) + assert unchanged(Min, sin(x), cos(x)) + assert Min(sin(x), cos(x)) == Min(cos(x), sin(x)) + assert Min(cos(x), sin(x)).subs(x, 1) == cos(1) + assert Min(cos(x), sin(x)).subs(x, S.Half) == sin(S.Half) + raises(ValueError, lambda: Min(cos(x), sin(x)).subs(x, I)) + raises(ValueError, lambda: Min(I)) + raises(ValueError, lambda: Min(I, x)) + raises(ValueError, lambda: Min(S.ComplexInfinity, x)) + + assert Min(1, x).diff(x) == Heaviside(1 - x) + assert Min(x, 1).diff(x) == Heaviside(1 - x) + assert Min(0, -x, 1 - 2*x).diff(x) == -Heaviside(x + Min(0, -2*x + 1)) \ + - 2*Heaviside(2*x + Min(0, -x) - 1) + + # issue 7619 + f = Function('f') + assert Min(1, 2*Min(f(1), 2)) # doesn't fail + + # issue 7233 + e = Min(0, x) + assert e.n().args == (0, x) + + # issue 8643 + m = Min(n, p_, n_, r) + assert m.is_positive is False + assert m.is_nonnegative is False + assert m.is_negative is True + + m = Min(p, p_) + assert m.is_positive is True + assert m.is_nonnegative is True + assert m.is_negative is False + + m = Min(p, nn_, p_) + assert m.is_positive is None + assert m.is_nonnegative is True + assert m.is_negative is False + + m = Min(nn, p, r) + assert m.is_positive is None + assert m.is_nonnegative is None + assert m.is_negative is None + + +def test_Max(): + from sympy.abc import x, y, z + n = Symbol('n', negative=True) + n_ = Symbol('n_', negative=True) + nn = Symbol('nn', nonnegative=True) + p = Symbol('p', positive=True) + p_ = Symbol('p_', positive=True) + r = Symbol('r', real=True) + + assert Max(5, 4) == 5 + + # lists + + assert Max() is S.NegativeInfinity + assert Max(x) == x + assert Max(x, y) == Max(y, x) + assert Max(x, y, z) == Max(z, y, x) + assert Max(x, Max(y, z)) == Max(z, y, x) + assert Max(x, Min(y, oo)) == Max(x, y) + assert Max(n, -oo, n_, p, 2) == Max(p, 2) + assert Max(n, -oo, n_, p) == p + assert Max(2, x, p, n, -oo, S.NegativeInfinity, n_, p, 2) == Max(2, x, p) + assert Max(0, x, 1, y) == Max(1, x, y) + assert Max(r, r + 1, r - 1) == 1 + r + assert Max(1000, 100, -100, x, p, n) == Max(p, x, 1000) + assert Max(cos(x), sin(x)) == Max(sin(x), cos(x)) + assert Max(cos(x), sin(x)).subs(x, 1) == sin(1) + assert Max(cos(x), sin(x)).subs(x, S.Half) == cos(S.Half) + raises(ValueError, lambda: Max(cos(x), sin(x)).subs(x, I)) + raises(ValueError, lambda: Max(I)) + raises(ValueError, lambda: Max(I, x)) + raises(ValueError, lambda: Max(S.ComplexInfinity, 1)) + assert Max(n, -oo, n_, p, 2) == Max(p, 2) + assert Max(n, -oo, n_, p, 1000) == Max(p, 1000) + + assert Max(1, x).diff(x) == Heaviside(x - 1) + assert Max(x, 1).diff(x) == Heaviside(x - 1) + assert Max(x**2, 1 + x, 1).diff(x) == \ + 2*x*Heaviside(x**2 - Max(1, x + 1)) \ + + Heaviside(x - Max(1, x**2) + 1) + + e = Max(0, x) + assert e.n().args == (0, x) + + # issue 8643 + m = Max(p, p_, n, r) + assert m.is_positive is True + assert m.is_nonnegative is True + assert m.is_negative is False + + m = Max(n, n_) + assert m.is_positive is False + assert m.is_nonnegative is False + assert m.is_negative is True + + m = Max(n, n_, r) + assert m.is_positive is None + assert m.is_nonnegative is None + assert m.is_negative is None + + m = Max(n, nn, r) + assert m.is_positive is None + assert m.is_nonnegative is True + assert m.is_negative is False + + +def test_minmax_assumptions(): + r = Symbol('r', real=True) + a = Symbol('a', real=True, algebraic=True) + t = Symbol('t', real=True, transcendental=True) + q = Symbol('q', rational=True) + p = Symbol('p', irrational=True) + n = Symbol('n', rational=True, integer=False) + i = Symbol('i', integer=True) + o = Symbol('o', odd=True) + e = Symbol('e', even=True) + k = Symbol('k', prime=True) + reals = [r, a, t, q, p, n, i, o, e, k] + + for ext in (Max, Min): + for x, y in it.product(reals, repeat=2): + + # Must be real + assert ext(x, y).is_real + + # Algebraic? + if x.is_algebraic and y.is_algebraic: + assert ext(x, y).is_algebraic + elif x.is_transcendental and y.is_transcendental: + assert ext(x, y).is_transcendental + else: + assert ext(x, y).is_algebraic is None + + # Rational? + if x.is_rational and y.is_rational: + assert ext(x, y).is_rational + elif x.is_irrational and y.is_irrational: + assert ext(x, y).is_irrational + else: + assert ext(x, y).is_rational is None + + # Integer? + if x.is_integer and y.is_integer: + assert ext(x, y).is_integer + elif x.is_noninteger and y.is_noninteger: + assert ext(x, y).is_noninteger + else: + assert ext(x, y).is_integer is None + + # Odd? + if x.is_odd and y.is_odd: + assert ext(x, y).is_odd + elif x.is_odd is False and y.is_odd is False: + assert ext(x, y).is_odd is False + else: + assert ext(x, y).is_odd is None + + # Even? + if x.is_even and y.is_even: + assert ext(x, y).is_even + elif x.is_even is False and y.is_even is False: + assert ext(x, y).is_even is False + else: + assert ext(x, y).is_even is None + + # Prime? + if x.is_prime and y.is_prime: + assert ext(x, y).is_prime + elif x.is_prime is False and y.is_prime is False: + assert ext(x, y).is_prime is False + else: + assert ext(x, y).is_prime is None + + +def test_issue_8413(): + x = Symbol('x', real=True) + # we can't evaluate in general because non-reals are not + # comparable: Min(floor(3.2 + I), 3.2 + I) -> ValueError + assert Min(floor(x), x) == floor(x) + assert Min(ceiling(x), x) == x + assert Max(floor(x), x) == x + assert Max(ceiling(x), x) == ceiling(x) + + +def test_root(): + from sympy.abc import x + n = Symbol('n', integer=True) + k = Symbol('k', integer=True) + + assert root(2, 2) == sqrt(2) + assert root(2, 1) == 2 + assert root(2, 3) == 2**Rational(1, 3) + assert root(2, 3) == cbrt(2) + assert root(2, -5) == 2**Rational(4, 5)/2 + + assert root(-2, 1) == -2 + + assert root(-2, 2) == sqrt(2)*I + assert root(-2, 1) == -2 + + assert root(x, 2) == sqrt(x) + assert root(x, 1) == x + assert root(x, 3) == x**Rational(1, 3) + assert root(x, 3) == cbrt(x) + assert root(x, -5) == x**Rational(-1, 5) + + assert root(x, n) == x**(1/n) + assert root(x, -n) == x**(-1/n) + + assert root(x, n, k) == (-1)**(2*k/n)*x**(1/n) + + +def test_real_root(): + assert real_root(-8, 3) == -2 + assert real_root(-16, 4) == root(-16, 4) + r = root(-7, 4) + assert real_root(r) == r + r1 = root(-1, 3) + r2 = r1**2 + r3 = root(-1, 4) + assert real_root(r1 + r2 + r3) == -1 + r2 + r3 + assert real_root(root(-2, 3)) == -root(2, 3) + assert real_root(-8., 3) == -2.0 + x = Symbol('x') + n = Symbol('n') + g = real_root(x, n) + assert g.subs({"x": -8, "n": 3}) == -2 + assert g.subs({"x": 8, "n": 3}) == 2 + # give principle root if there is no real root -- if this is not desired + # then maybe a Root class is needed to raise an error instead + assert g.subs({"x": I, "n": 3}) == cbrt(I) + assert g.subs({"x": -8, "n": 2}) == sqrt(-8) + assert g.subs({"x": I, "n": 2}) == sqrt(I) + + +def test_issue_11463(): + numpy = import_module('numpy') + if not numpy: + skip("numpy not installed.") + x = Symbol('x') + f = lambdify(x, real_root((log(x/(x-2))), 3), 'numpy') + # numpy.select evaluates all options before considering conditions, + # so it raises a warning about root of negative number which does + # not affect the outcome. This warning is suppressed here + with ignore_warnings(RuntimeWarning): + assert f(numpy.array(-1)) < -1 + + +def test_rewrite_MaxMin_as_Heaviside(): + from sympy.abc import x + assert Max(0, x).rewrite(Heaviside) == x*Heaviside(x) + assert Max(3, x).rewrite(Heaviside) == x*Heaviside(x - 3) + \ + 3*Heaviside(-x + 3) + assert Max(0, x+2, 2*x).rewrite(Heaviside) == \ + 2*x*Heaviside(2*x)*Heaviside(x - 2) + \ + (x + 2)*Heaviside(-x + 2)*Heaviside(x + 2) + + assert Min(0, x).rewrite(Heaviside) == x*Heaviside(-x) + assert Min(3, x).rewrite(Heaviside) == x*Heaviside(-x + 3) + \ + 3*Heaviside(x - 3) + assert Min(x, -x, -2).rewrite(Heaviside) == \ + x*Heaviside(-2*x)*Heaviside(-x - 2) - \ + x*Heaviside(2*x)*Heaviside(x - 2) \ + - 2*Heaviside(-x + 2)*Heaviside(x + 2) + + +def test_rewrite_MaxMin_as_Piecewise(): + from sympy.core.symbol import symbols + from sympy.functions.elementary.piecewise import Piecewise + x, y, z, a, b = symbols('x y z a b', real=True) + vx, vy, va = symbols('vx vy va') + assert Max(a, b).rewrite(Piecewise) == Piecewise((a, a >= b), (b, True)) + assert Max(x, y, z).rewrite(Piecewise) == Piecewise((x, (x >= y) & (x >= z)), (y, y >= z), (z, True)) + assert Max(x, y, a, b).rewrite(Piecewise) == Piecewise((a, (a >= b) & (a >= x) & (a >= y)), + (b, (b >= x) & (b >= y)), (x, x >= y), (y, True)) + assert Min(a, b).rewrite(Piecewise) == Piecewise((a, a <= b), (b, True)) + assert Min(x, y, z).rewrite(Piecewise) == Piecewise((x, (x <= y) & (x <= z)), (y, y <= z), (z, True)) + assert Min(x, y, a, b).rewrite(Piecewise) == Piecewise((a, (a <= b) & (a <= x) & (a <= y)), + (b, (b <= x) & (b <= y)), (x, x <= y), (y, True)) + + # Piecewise rewriting of Min/Max does also takes place for not explicitly real arguments + assert Max(vx, vy).rewrite(Piecewise) == Piecewise((vx, vx >= vy), (vy, True)) + assert Min(va, vx, vy).rewrite(Piecewise) == Piecewise((va, (va <= vx) & (va <= vy)), (vx, vx <= vy), (vy, True)) + + +def test_issue_11099(): + from sympy.abc import x, y + # some fixed value tests + fixed_test_data = {x: -2, y: 3} + assert Min(x, y).evalf(subs=fixed_test_data) == \ + Min(x, y).subs(fixed_test_data).evalf() + assert Max(x, y).evalf(subs=fixed_test_data) == \ + Max(x, y).subs(fixed_test_data).evalf() + # randomly generate some test data + from sympy.core.random import randint + for i in range(20): + random_test_data = {x: randint(-100, 100), y: randint(-100, 100)} + assert Min(x, y).evalf(subs=random_test_data) == \ + Min(x, y).subs(random_test_data).evalf() + assert Max(x, y).evalf(subs=random_test_data) == \ + Max(x, y).subs(random_test_data).evalf() + + +def test_issue_12638(): + from sympy.abc import a, b, c + assert Min(a, b, c, Max(a, b)) == Min(a, b, c) + assert Min(a, b, Max(a, b, c)) == Min(a, b) + assert Min(a, b, Max(a, c)) == Min(a, b) + +def test_issue_21399(): + from sympy.abc import a, b, c + assert Max(Min(a, b), Min(a, b, c)) == Min(a, b) + + +def test_instantiation_evaluation(): + from sympy.abc import v, w, x, y, z + assert Min(1, Max(2, x)) == 1 + assert Max(3, Min(2, x)) == 3 + assert Min(Max(x, y), Max(x, z)) == Max(x, Min(y, z)) + assert set(Min(Max(w, x), Max(y, z)).args) == { + Max(w, x), Max(y, z)} + assert Min(Max(x, y), Max(x, z), w) == Min( + w, Max(x, Min(y, z))) + A, B = Min, Max + for i in range(2): + assert A(x, B(x, y)) == x + assert A(x, B(y, A(x, w, z))) == A(x, B(y, A(w, z))) + A, B = B, A + assert Min(w, Max(x, y), Max(v, x, z)) == Min( + w, Max(x, Min(y, Max(v, z)))) + +def test_rewrite_as_Abs(): + from itertools import permutations + from sympy.functions.elementary.complexes import Abs + from sympy.abc import x, y, z, w + def test(e): + free = e.free_symbols + a = e.rewrite(Abs) + assert not a.has(Min, Max) + for i in permutations(range(len(free))): + reps = dict(zip(free, i)) + assert a.xreplace(reps) == e.xreplace(reps) + test(Min(x, y)) + test(Max(x, y)) + test(Min(x, y, z)) + test(Min(Max(w, x), Max(y, z))) + +def test_issue_14000(): + assert isinstance(sqrt(4, evaluate=False), Pow) == True + assert isinstance(cbrt(3.5, evaluate=False), Pow) == True + assert isinstance(root(16, 4, evaluate=False), Pow) == True + + assert sqrt(4, evaluate=False) == Pow(4, S.Half, evaluate=False) + assert cbrt(3.5, evaluate=False) == Pow(3.5, Rational(1, 3), evaluate=False) + assert root(4, 2, evaluate=False) == Pow(4, S.Half, evaluate=False) + + assert root(16, 4, 2, evaluate=False).has(Pow) == True + assert real_root(-8, 3, evaluate=False).has(Pow) == True + +def test_issue_6899(): + from sympy.core.function import Lambda + x = Symbol('x') + eqn = Lambda(x, x) + assert eqn.func(*eqn.args) == eqn + +def test_Rem(): + from sympy.abc import x, y + assert Rem(5, 3) == 2 + assert Rem(-5, 3) == -2 + assert Rem(5, -3) == 2 + assert Rem(-5, -3) == -2 + assert Rem(x**3, y) == Rem(x**3, y) + assert Rem(Rem(-5, 3) + 3, 3) == 1 + + +def test_minmax_no_evaluate(): + from sympy import evaluate + p = Symbol('p', positive=True) + + assert Max(1, 3) == 3 + assert Max(1, 3).args == () + assert Max(0, p) == p + assert Max(0, p).args == () + assert Min(0, p) == 0 + assert Min(0, p).args == () + + assert Max(1, 3, evaluate=False) != 3 + assert Max(1, 3, evaluate=False).args == (1, 3) + assert Max(0, p, evaluate=False) != p + assert Max(0, p, evaluate=False).args == (0, p) + assert Min(0, p, evaluate=False) != 0 + assert Min(0, p, evaluate=False).args == (0, p) + + with evaluate(False): + assert Max(1, 3) != 3 + assert Max(1, 3).args == (1, 3) + assert Max(0, p) != p + assert Max(0, p).args == (0, p) + assert Min(0, p) != 0 + assert Min(0, p).args == (0, p) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_piecewise.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_piecewise.py new file mode 100644 index 0000000000000000000000000000000000000000..7d0728095578b49480a1334857a1c237012d2534 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_piecewise.py @@ -0,0 +1,1639 @@ +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.expr import unchanged +from sympy.core.function import (Function, diff, expand) +from sympy.core.mul import Mul +from sympy.core.mod import Mod +from sympy.core.numbers import (Float, I, Rational, oo, pi, zoo) +from sympy.core.relational import (Eq, Ge, Gt, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (Abs, adjoint, arg, conjugate, im, re, transpose) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (Max, Min, sqrt) +from sympy.functions.elementary.piecewise import (Piecewise, + piecewise_fold, piecewise_exclusive, Undefined, ExprCondPair) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.delta_functions import (DiracDelta, Heaviside) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.integrals.integrals import (Integral, integrate) +from sympy.logic.boolalg import (And, ITE, Not, Or) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.printing import srepr +from sympy.sets.contains import Contains +from sympy.sets.sets import Interval +from sympy.solvers.solvers import solve +from sympy.testing.pytest import raises, slow +from sympy.utilities.lambdify import lambdify + +a, b, c, d, x, y = symbols('a:d, x, y') +z = symbols('z', nonzero=True) + + +def test_piecewise1(): + + # Test canonicalization + assert Piecewise((x, x < 1.)).has(1.0) # doesn't get changed to x < 1 + assert unchanged(Piecewise, ExprCondPair(x, x < 1), ExprCondPair(0, True)) + assert Piecewise((x, x < 1), (0, True)) == Piecewise(ExprCondPair(x, x < 1), + ExprCondPair(0, True)) + assert Piecewise((x, x < 1), (0, True), (1, True)) == \ + Piecewise((x, x < 1), (0, True)) + assert Piecewise((x, x < 1), (0, False), (-1, 1 > 2)) == \ + Piecewise((x, x < 1)) + assert Piecewise((x, x < 1), (0, x < 1), (0, True)) == \ + Piecewise((x, x < 1), (0, True)) + assert Piecewise((x, x < 1), (0, x < 2), (0, True)) == \ + Piecewise((x, x < 1), (0, True)) + assert Piecewise((x, x < 1), (x, x < 2), (0, True)) == \ + Piecewise((x, Or(x < 1, x < 2)), (0, True)) + assert Piecewise((x, x < 1), (x, x < 2), (x, True)) == x + assert Piecewise((x, True)) == x + # Explicitly constructed empty Piecewise not accepted + raises(TypeError, lambda: Piecewise()) + # False condition is never retained + assert Piecewise((2*x, x < 0), (x, False)) == \ + Piecewise((2*x, x < 0), (x, False), evaluate=False) == \ + Piecewise((2*x, x < 0)) + assert Piecewise((x, False)) == Undefined + raises(TypeError, lambda: Piecewise(x)) + assert Piecewise((x, 1)) == x # 1 and 0 are accepted as True/False + raises(TypeError, lambda: Piecewise((x, 2))) + raises(TypeError, lambda: Piecewise((x, x**2))) + raises(TypeError, lambda: Piecewise(([1], True))) + assert Piecewise(((1, 2), True)) == Tuple(1, 2) + cond = (Piecewise((1, x < 0), (2, True)) < y) + assert Piecewise((1, cond) + ) == Piecewise((1, ITE(x < 0, y > 1, y > 2))) + + assert Piecewise((1, x > 0), (2, And(x <= 0, x > -1)) + ) == Piecewise((1, x > 0), (2, x > -1)) + assert Piecewise((1, x <= 0), (2, (x < 0) & (x > -1)) + ) == Piecewise((1, x <= 0)) + + # test for supporting Contains in Piecewise + pwise = Piecewise( + (1, And(x <= 6, x > 1, Contains(x, S.Integers))), + (0, True)) + assert pwise.subs(x, pi) == 0 + assert pwise.subs(x, 2) == 1 + assert pwise.subs(x, 7) == 0 + + # Test subs + p = Piecewise((-1, x < -1), (x**2, x < 0), (log(x), x >= 0)) + p_x2 = Piecewise((-1, x**2 < -1), (x**4, x**2 < 0), (log(x**2), x**2 >= 0)) + assert p.subs(x, x**2) == p_x2 + assert p.subs(x, -5) == -1 + assert p.subs(x, -1) == 1 + assert p.subs(x, 1) == log(1) + + # More subs tests + p2 = Piecewise((1, x < pi), (-1, x < 2*pi), (0, x > 2*pi)) + p3 = Piecewise((1, Eq(x, 0)), (1/x, True)) + p4 = Piecewise((1, Eq(x, 0)), (2, 1/x>2)) + assert p2.subs(x, 2) == 1 + assert p2.subs(x, 4) == -1 + assert p2.subs(x, 10) == 0 + assert p3.subs(x, 0.0) == 1 + assert p4.subs(x, 0.0) == 1 + + + f, g, h = symbols('f,g,h', cls=Function) + pf = Piecewise((f(x), x < -1), (f(x) + h(x) + 2, x <= 1)) + pg = Piecewise((g(x), x < -1), (g(x) + h(x) + 2, x <= 1)) + assert pg.subs(g, f) == pf + + assert Piecewise((1, Eq(x, 0)), (0, True)).subs(x, 0) == 1 + assert Piecewise((1, Eq(x, 0)), (0, True)).subs(x, 1) == 0 + assert Piecewise((1, Eq(x, y)), (0, True)).subs(x, y) == 1 + assert Piecewise((1, Eq(x, z)), (0, True)).subs(x, z) == 1 + assert Piecewise((1, Eq(exp(x), cos(z))), (0, True)).subs(x, z) == \ + Piecewise((1, Eq(exp(z), cos(z))), (0, True)) + + p5 = Piecewise( (0, Eq(cos(x) + y, 0)), (1, True)) + assert p5.subs(y, 0) == Piecewise( (0, Eq(cos(x), 0)), (1, True)) + + assert Piecewise((-1, y < 1), (0, x < 0), (1, Eq(x, 0)), (2, True) + ).subs(x, 1) == Piecewise((-1, y < 1), (2, True)) + assert Piecewise((1, Eq(x**2, -1)), (2, x < 0)).subs(x, I) == 1 + + p6 = Piecewise((x, x > 0)) + n = symbols('n', negative=True) + assert p6.subs(x, n) == Undefined + + # Test evalf + assert p.evalf() == Piecewise((-1.0, x < -1), (x**2, x < 0), (log(x), True)) + assert p.evalf(subs={x: -2}) == -1.0 + assert p.evalf(subs={x: -1}) == 1.0 + assert p.evalf(subs={x: 1}) == log(1) + assert p6.evalf(subs={x: -5}) == Undefined + + # Test doit + f_int = Piecewise((Integral(x, (x, 0, 1)), x < 1)) + assert f_int.doit() == Piecewise( (S.Half, x < 1) ) + + # Test differentiation + f = x + fp = x*p + dp = Piecewise((0, x < -1), (2*x, x < 0), (1/x, x >= 0)) + fp_dx = x*dp + p + assert diff(p, x) == dp + assert diff(f*p, x) == fp_dx + + # Test simple arithmetic + assert x*p == fp + assert x*p + p == p + x*p + assert p + f == f + p + assert p + dp == dp + p + assert p - dp == -(dp - p) + + # Test power + dp2 = Piecewise((0, x < -1), (4*x**2, x < 0), (1/x**2, x >= 0)) + assert dp**2 == dp2 + + # Test _eval_interval + f1 = x*y + 2 + f2 = x*y**2 + 3 + peval = Piecewise((f1, x < 0), (f2, x > 0)) + peval_interval = f1.subs( + x, 0) - f1.subs(x, -1) + f2.subs(x, 1) - f2.subs(x, 0) + assert peval._eval_interval(x, 0, 0) == 0 + assert peval._eval_interval(x, -1, 1) == peval_interval + peval2 = Piecewise((f1, x < 0), (f2, True)) + assert peval2._eval_interval(x, 0, 0) == 0 + assert peval2._eval_interval(x, 1, -1) == -peval_interval + assert peval2._eval_interval(x, -1, -2) == f1.subs(x, -2) - f1.subs(x, -1) + assert peval2._eval_interval(x, -1, 1) == peval_interval + assert peval2._eval_interval(x, None, 0) == peval2.subs(x, 0) + assert peval2._eval_interval(x, -1, None) == -peval2.subs(x, -1) + + # Test integration + assert p.integrate() == Piecewise( + (-x, x < -1), + (x**3/3 + Rational(4, 3), x < 0), + (x*log(x) - x + Rational(4, 3), True)) + p = Piecewise((x, x < 1), (x**2, -1 <= x), (x, 3 < x)) + assert integrate(p, (x, -2, 2)) == Rational(5, 6) + assert integrate(p, (x, 2, -2)) == Rational(-5, 6) + p = Piecewise((0, x < 0), (1, x < 1), (0, x < 2), (1, x < 3), (0, True)) + assert integrate(p, (x, -oo, oo)) == 2 + p = Piecewise((x, x < -10), (x**2, x <= -1), (x, 1 < x)) + assert integrate(p, (x, -2, 2)) == Undefined + + # Test commutativity + assert isinstance(p, Piecewise) and p.is_commutative is True + + +def test_piecewise_free_symbols(): + f = Piecewise((x, a < 0), (y, True)) + assert f.free_symbols == {x, y, a} + + +def test_piecewise_integrate1(): + x, y = symbols('x y', real=True) + + f = Piecewise(((x - 2)**2, x >= 0), (1, True)) + assert integrate(f, (x, -2, 2)) == Rational(14, 3) + + g = Piecewise(((x - 5)**5, x >= 4), (f, True)) + assert integrate(g, (x, -2, 2)) == Rational(14, 3) + assert integrate(g, (x, -2, 5)) == Rational(43, 6) + + assert g == Piecewise(((x - 5)**5, x >= 4), (f, x < 4)) + + g = Piecewise(((x - 5)**5, 2 <= x), (f, x < 2)) + assert integrate(g, (x, -2, 2)) == Rational(14, 3) + assert integrate(g, (x, -2, 5)) == Rational(-701, 6) + + assert g == Piecewise(((x - 5)**5, 2 <= x), (f, True)) + + g = Piecewise(((x - 5)**5, 2 <= x), (2*f, True)) + assert integrate(g, (x, -2, 2)) == Rational(28, 3) + assert integrate(g, (x, -2, 5)) == Rational(-673, 6) + + +def test_piecewise_integrate1b(): + g = Piecewise((1, x > 0), (0, Eq(x, 0)), (-1, x < 0)) + assert integrate(g, (x, -1, 1)) == 0 + + g = Piecewise((1, x - y < 0), (0, True)) + assert integrate(g, (y, -oo, 0)) == -Min(0, x) + assert g.subs(x, -3).integrate((y, -oo, 0)) == 3 + assert integrate(g, (y, 0, -oo)) == Min(0, x) + assert integrate(g, (y, 0, oo)) == -Max(0, x) + oo + assert integrate(g, (y, -oo, 42)) == -Min(42, x) + 42 + assert integrate(g, (y, -oo, oo)) == -x + oo + + g = Piecewise((0, x < 0), (x, x <= 1), (1, True)) + gy1 = g.integrate((x, y, 1)) + g1y = g.integrate((x, 1, y)) + for yy in (-1, S.Half, 2): + assert g.integrate((x, yy, 1)) == gy1.subs(y, yy) + assert g.integrate((x, 1, yy)) == g1y.subs(y, yy) + assert gy1 == Piecewise( + (-Min(1, Max(0, y))**2/2 + S.Half, y < 1), + (-y + 1, True)) + assert g1y == Piecewise( + (Min(1, Max(0, y))**2/2 - S.Half, y < 1), + (y - 1, True)) + + +@slow +def test_piecewise_integrate1ca(): + y = symbols('y', real=True) + g = Piecewise( + (1 - x, Interval(0, 1).contains(x)), + (1 + x, Interval(-1, 0).contains(x)), + (0, True) + ) + gy1 = g.integrate((x, y, 1)) + g1y = g.integrate((x, 1, y)) + + assert g.integrate((x, -2, 1)) == gy1.subs(y, -2) + assert g.integrate((x, 1, -2)) == g1y.subs(y, -2) + assert g.integrate((x, 0, 1)) == gy1.subs(y, 0) + assert g.integrate((x, 1, 0)) == g1y.subs(y, 0) + assert g.integrate((x, 2, 1)) == gy1.subs(y, 2) + assert g.integrate((x, 1, 2)) == g1y.subs(y, 2) + assert piecewise_fold(gy1.rewrite(Piecewise) + ).simplify() == Piecewise( + (1, y <= -1), + (-y**2/2 - y + S.Half, y <= 0), + (y**2/2 - y + S.Half, y < 1), + (0, True)) + assert piecewise_fold(g1y.rewrite(Piecewise) + ).simplify() == Piecewise( + (-1, y <= -1), + (y**2/2 + y - S.Half, y <= 0), + (-y**2/2 + y - S.Half, y < 1), + (0, True)) + assert gy1 == Piecewise( + ( + -Min(1, Max(-1, y))**2/2 - Min(1, Max(-1, y)) + + Min(1, Max(0, y))**2 + S.Half, y < 1), + (0, True) + ) + assert g1y == Piecewise( + ( + Min(1, Max(-1, y))**2/2 + Min(1, Max(-1, y)) - + Min(1, Max(0, y))**2 - S.Half, y < 1), + (0, True)) + + +@slow +def test_piecewise_integrate1cb(): + y = symbols('y', real=True) + g = Piecewise( + (0, Or(x <= -1, x >= 1)), + (1 - x, x > 0), + (1 + x, True) + ) + gy1 = g.integrate((x, y, 1)) + g1y = g.integrate((x, 1, y)) + + assert g.integrate((x, -2, 1)) == gy1.subs(y, -2) + assert g.integrate((x, 1, -2)) == g1y.subs(y, -2) + assert g.integrate((x, 0, 1)) == gy1.subs(y, 0) + assert g.integrate((x, 1, 0)) == g1y.subs(y, 0) + assert g.integrate((x, 2, 1)) == gy1.subs(y, 2) + assert g.integrate((x, 1, 2)) == g1y.subs(y, 2) + + assert piecewise_fold(gy1.rewrite(Piecewise) + ).simplify() == Piecewise( + (1, y <= -1), + (-y**2/2 - y + S.Half, y <= 0), + (y**2/2 - y + S.Half, y < 1), + (0, True)) + assert piecewise_fold(g1y.rewrite(Piecewise) + ).simplify() == Piecewise( + (-1, y <= -1), + (y**2/2 + y - S.Half, y <= 0), + (-y**2/2 + y - S.Half, y < 1), + (0, True)) + + # g1y and gy1 should simplify if the condition that y < 1 + # is applied, e.g. Min(1, Max(-1, y)) --> Max(-1, y) + assert gy1 == Piecewise( + ( + -Min(1, Max(-1, y))**2/2 - Min(1, Max(-1, y)) + + Min(1, Max(0, y))**2 + S.Half, y < 1), + (0, True) + ) + assert g1y == Piecewise( + ( + Min(1, Max(-1, y))**2/2 + Min(1, Max(-1, y)) - + Min(1, Max(0, y))**2 - S.Half, y < 1), + (0, True)) + + +def test_piecewise_integrate2(): + from itertools import permutations + lim = Tuple(x, c, d) + p = Piecewise((1, x < a), (2, x > b), (3, True)) + q = p.integrate(lim) + assert q == Piecewise( + (-c + 2*d - 2*Min(d, Max(a, c)) + Min(d, Max(a, b, c)), c < d), + (-2*c + d + 2*Min(c, Max(a, d)) - Min(c, Max(a, b, d)), True)) + for v in permutations((1, 2, 3, 4)): + r = dict(zip((a, b, c, d), v)) + assert p.subs(r).integrate(lim.subs(r)) == q.subs(r) + + +def test_meijer_bypass(): + # totally bypass meijerg machinery when dealing + # with Piecewise in integrate + assert Piecewise((1, x < 4), (0, True)).integrate((x, oo, 1)) == -3 + + +def test_piecewise_integrate3_inequality_conditions(): + from sympy.utilities.iterables import cartes + lim = (x, 0, 5) + # set below includes two pts below range, 2 pts in range, + # 2 pts above range, and the boundaries + N = (-2, -1, 0, 1, 2, 5, 6, 7) + + p = Piecewise((1, x > a), (2, x > b), (0, True)) + ans = p.integrate(lim) + for i, j in cartes(N, repeat=2): + reps = dict(zip((a, b), (i, j))) + assert ans.subs(reps) == p.subs(reps).integrate(lim) + assert ans.subs(a, 4).subs(b, 1) == 0 + 2*3 + 1 + + p = Piecewise((1, x > a), (2, x < b), (0, True)) + ans = p.integrate(lim) + for i, j in cartes(N, repeat=2): + reps = dict(zip((a, b), (i, j))) + assert ans.subs(reps) == p.subs(reps).integrate(lim) + + # delete old tests that involved c1 and c2 since those + # reduce to the above except that a value of 0 was used + # for two expressions whereas the above uses 3 different + # values + + +@slow +def test_piecewise_integrate4_symbolic_conditions(): + a = Symbol('a', real=True) + b = Symbol('b', real=True) + x = Symbol('x', real=True) + y = Symbol('y', real=True) + p0 = Piecewise((0, Or(x < a, x > b)), (1, True)) + p1 = Piecewise((0, x < a), (0, x > b), (1, True)) + p2 = Piecewise((0, x > b), (0, x < a), (1, True)) + p3 = Piecewise((0, x < a), (1, x < b), (0, True)) + p4 = Piecewise((0, x > b), (1, x > a), (0, True)) + p5 = Piecewise((1, And(a < x, x < b)), (0, True)) + + # check values of a=1, b=3 (and reversed) with values + # of y of 0, 1, 2, 3, 4 + lim = Tuple(x, -oo, y) + for p in (p0, p1, p2, p3, p4, p5): + ans = p.integrate(lim) + for i in range(5): + reps = {a:1, b:3, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + reps = {a: 3, b:1, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + lim = Tuple(x, y, oo) + for p in (p0, p1, p2, p3, p4, p5): + ans = p.integrate(lim) + for i in range(5): + reps = {a:1, b:3, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + reps = {a:3, b:1, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + + ans = Piecewise( + (0, x <= Min(a, b)), + (x - Min(a, b), x <= b), + (b - Min(a, b), True)) + for i in (p0, p1, p2, p4): + assert i.integrate(x) == ans + assert p3.integrate(x) == Piecewise( + (0, x < a), + (-a + x, x <= Max(a, b)), + (-a + Max(a, b), True)) + assert p5.integrate(x) == Piecewise( + (0, x <= a), + (-a + x, x <= Max(a, b)), + (-a + Max(a, b), True)) + + p1 = Piecewise((0, x < a), (S.Half, x > b), (1, True)) + p2 = Piecewise((S.Half, x > b), (0, x < a), (1, True)) + p3 = Piecewise((0, x < a), (1, x < b), (S.Half, True)) + p4 = Piecewise((S.Half, x > b), (1, x > a), (0, True)) + p5 = Piecewise((1, And(a < x, x < b)), (S.Half, x > b), (0, True)) + + # check values of a=1, b=3 (and reversed) with values + # of y of 0, 1, 2, 3, 4 + lim = Tuple(x, -oo, y) + for p in (p1, p2, p3, p4, p5): + ans = p.integrate(lim) + for i in range(5): + reps = {a:1, b:3, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + reps = {a: 3, b:1, y:i} + assert ans.subs(reps) == p.subs(reps).integrate(lim.subs(reps)) + + +def test_piecewise_integrate5_independent_conditions(): + p = Piecewise((0, Eq(y, 0)), (x*y, True)) + assert integrate(p, (x, 1, 3)) == Piecewise((0, Eq(y, 0)), (4*y, True)) + + +def test_issue_22917(): + p = (Piecewise((0, ITE((x - y > 1) | (2 * x - 2 * y > 1), False, + ITE(x - y > 1, 2 * y - 2 < -1, 2 * x - 2 * y > 1))), + (Piecewise((0, ITE(x - y > 1, True, 2 * x - 2 * y > 1)), + (2 * Piecewise((0, x - y > 1), (y, True)), True)), True)) + + 2 * Piecewise((1, ITE((x - y > 1) | (2 * x - 2 * y > 1), False, + ITE(x - y > 1, 2 * y - 2 < -1, 2 * x - 2 * y > 1))), + (Piecewise((1, ITE(x - y > 1, True, 2 * x - 2 * y > 1)), + (2 * Piecewise((1, x - y > 1), (x, True)), True)), True))) + assert piecewise_fold(p) == Piecewise((2, (x - y > S.Half) | (x - y > 1)), + (2*y + 4, x - y > 1), + (4*x + 2*y, True)) + assert piecewise_fold(p > 1).rewrite(ITE) == ITE((x - y > S.Half) | (x - y > 1), True, + ITE(x - y > 1, 2*y + 4 > 1, 4*x + 2*y > 1)) + + +def test_piecewise_simplify(): + p = Piecewise(((x**2 + 1)/x**2, Eq(x*(1 + x) - x**2, 0)), + ((-1)**x*(-1), True)) + assert p.simplify() == \ + Piecewise((zoo, Eq(x, 0)), ((-1)**(x + 1), True)) + # simplify when there are Eq in conditions + assert Piecewise( + (a, And(Eq(a, 0), Eq(a + b, 0))), (1, True)).simplify( + ) == Piecewise( + (0, And(Eq(a, 0), Eq(b, 0))), (1, True)) + assert Piecewise((2*x*factorial(a)/(factorial(y)*factorial(-y + a)), + Eq(y, 0) & Eq(-y + a, 0)), (2*factorial(a)/(factorial(y)*factorial(-y + + a)), Eq(y, 0) & Eq(-y + a, 1)), (0, True)).simplify( + ) == Piecewise( + (2*x, And(Eq(a, 0), Eq(y, 0))), + (2, And(Eq(a, 1), Eq(y, 0))), + (0, True)) + args = (2, And(Eq(x, 2), Ge(y, 0))), (x, True) + assert Piecewise(*args).simplify() == Piecewise(*args) + args = (1, Eq(x, 0)), (sin(x)/x, True) + assert Piecewise(*args).simplify() == Piecewise(*args) + assert Piecewise((2 + y, And(Eq(x, 2), Eq(y, 0))), (x, True) + ).simplify() == x + # check that x or f(x) are recognized as being Symbol-like for lhs + args = Tuple((1, Eq(x, 0)), (sin(x) + 1 + x, True)) + ans = x + sin(x) + 1 + f = Function('f') + assert Piecewise(*args).simplify() == ans + assert Piecewise(*args.subs(x, f(x))).simplify() == ans.subs(x, f(x)) + + # issue 18634 + d = Symbol("d", integer=True) + n = Symbol("n", integer=True) + t = Symbol("t", positive=True) + expr = Piecewise((-d + 2*n, Eq(1/t, 1)), (t**(1 - 4*n)*t**(4*n - 1)*(-d + 2*n), True)) + assert expr.simplify() == -d + 2*n + + # issue 22747 + p = Piecewise((0, (t < -2) & (t < -1) & (t < 0)), ((t/2 + 1)*(t + + 1)*(t + 2), (t < -1) & (t < 0)), ((S.Half - t/2)*(1 - t)*(t + 1), + (t < -2) & (t < -1) & (t < 1)), ((t + 1)*(-t*(t/2 + 1) + (S.Half + - t/2)*(1 - t)), (t < -2) & (t < -1) & (t < 0) & (t < 1)), ((t + + 1)*((S.Half - t/2)*(1 - t) + (t/2 + 1)*(t + 2)), (t < -1) & (t < + 1)), ((t + 1)*(-t*(t/2 + 1) + (S.Half - t/2)*(1 - t)), (t < -1) & + (t < 0) & (t < 1)), (0, (t < -2) & (t < -1)), ((t/2 + 1)*(t + + 1)*(t + 2), t < -1), ((t + 1)*(-t*(t/2 + 1) + (S.Half - t/2)*(t + + 1)), (t < 0) & ((t < -2) | (t < 0))), ((S.Half - t/2)*(1 - t)*(t + + 1), (t < 1) & ((t < -2) | (t < 1))), (0, True)) + Piecewise((0, + (t < -1) & (t < 0) & (t < 1)), ((1 - t)*(t/2 + S.Half)*(t + 1), + (t < 0) & (t < 1)), ((1 - t)*(1 - t/2)*(2 - t), (t < -1) & (t < + 0) & (t < 2)), ((1 - t)*((1 - t)*(t/2 + S.Half) + (1 - t/2)*(2 - + t)), (t < -1) & (t < 0) & (t < 1) & (t < 2)), ((1 - t)*((1 - + t/2)*(2 - t) + (t/2 + S.Half)*(t + 1)), (t < 0) & (t < 2)), ((1 - + t)*((1 - t)*(t/2 + S.Half) + (1 - t/2)*(2 - t)), (t < 0) & (t < + 1) & (t < 2)), (0, (t < -1) & (t < 0)), ((1 - t)*(t/2 + + S.Half)*(t + 1), t < 0), ((1 - t)*(t*(1 - t/2) + (1 - t)*(t/2 + + S.Half)), (t < 1) & ((t < -1) | (t < 1))), ((1 - t)*(1 - t/2)*(2 + - t), (t < 2) & ((t < -1) | (t < 2))), (0, True)) + assert p.simplify() == Piecewise( + (0, t < -2), ((t + 1)*(t + 2)**2/2, t < -1), (-3*t**3/2 + - 5*t**2/2 + 1, t < 0), (3*t**3/2 - 5*t**2/2 + 1, t < 1), ((1 - + t)*(t - 2)**2/2, t < 2), (0, True)) + + # coverage + nan = Undefined + assert Piecewise((1, x > 3), (2, x < 2), (3, x > 1)).simplify( + ) == Piecewise((1, x > 3), (2, x < 2), (3, True)) + assert Piecewise((1, x < 2), (2, x < 1), (3, True)).simplify( + ) == Piecewise((1, x < 2), (3, True)) + assert Piecewise((1, x > 2)).simplify() == Piecewise((1, x > 2), + (nan, True)) + assert Piecewise((1, (x >= 2) & (x < oo)) + ).simplify() == Piecewise((1, (x >= 2) & (x < oo)), (nan, True)) + assert Piecewise((1, x < 2), (2, (x > 1) & (x < 3)), (3, True) + ). simplify() == Piecewise((1, x < 2), (2, x < 3), (3, True)) + assert Piecewise((1, x < 2), (2, (x <= 3) & (x > 1)), (3, True) + ).simplify() == Piecewise((1, x < 2), (2, x <= 3), (3, True)) + assert Piecewise((1, x < 2), (2, (x > 2) & (x < 3)), (3, True) + ).simplify() == Piecewise((1, x < 2), (2, (x > 2) & (x < 3)), + (3, True)) + assert Piecewise((1, x < 2), (2, (x >= 1) & (x <= 3)), (3, True) + ).simplify() == Piecewise((1, x < 2), (2, x <= 3), (3, True)) + assert Piecewise((1, x < 1), (2, (x >= 2) & (x <= 3)), (3, True) + ).simplify() == Piecewise((1, x < 1), (2, (x >= 2) & (x <= 3)), + (3, True)) + # https://github.com/sympy/sympy/issues/25603 + assert Piecewise((log(x), (x <= 5) & (x > 3)), (x, True) + ).simplify() == Piecewise((log(x), (x <= 5) & (x > 3)), (x, True)) + + assert Piecewise((1, (x >= 1) & (x < 3)), (2, (x > 2) & (x < 4)) + ).simplify() == Piecewise((1, (x >= 1) & (x < 3)), ( + 2, (x >= 3) & (x < 4)), (nan, True)) + assert Piecewise((1, (x >= 1) & (x <= 3)), (2, (x > 2) & (x < 4)) + ).simplify() == Piecewise((1, (x >= 1) & (x <= 3)), ( + 2, (x > 3) & (x < 4)), (nan, True)) + + # involves a symbolic range so cset.inf fails + L = Symbol('L', nonnegative=True) + p = Piecewise((nan, x <= 0), (0, (x >= 0) & (L > x) & (L - x <= 0)), + (x - L/2, (L > x) & (L - x <= 0)), + (L/2 - x, (x >= 0) & (L > x)), + (0, L > x), (nan, True)) + assert p.simplify() == Piecewise( + (nan, x <= 0), (L/2 - x, L > x), (nan, True)) + assert p.subs(L, y).simplify() == Piecewise( + (nan, x <= 0), (-x + y/2, x < Max(0, y)), (0, x < y), (nan, True)) + + +def test_piecewise_solve(): + abs2 = Piecewise((-x, x <= 0), (x, x > 0)) + f = abs2.subs(x, x - 2) + assert solve(f, x) == [2] + assert solve(f - 1, x) == [1, 3] + + f = Piecewise(((x - 2)**2, x >= 0), (1, True)) + assert solve(f, x) == [2] + + g = Piecewise(((x - 5)**5, x >= 4), (f, True)) + assert solve(g, x) == [2, 5] + + g = Piecewise(((x - 5)**5, x >= 4), (f, x < 4)) + assert solve(g, x) == [2, 5] + + g = Piecewise(((x - 5)**5, x >= 2), (f, x < 2)) + assert solve(g, x) == [5] + + g = Piecewise(((x - 5)**5, x >= 2), (f, True)) + assert solve(g, x) == [5] + + g = Piecewise(((x - 5)**5, x >= 2), (f, True), (10, False)) + assert solve(g, x) == [5] + + g = Piecewise(((x - 5)**5, x >= 2), + (-x + 2, x - 2 <= 0), (x - 2, x - 2 > 0)) + assert solve(g, x) == [5] + + # if no symbol is given the piecewise detection must still work + assert solve(Piecewise((x - 2, x > 2), (2 - x, True)) - 3) == [-1, 5] + + f = Piecewise(((x - 2)**2, x >= 0), (0, True)) + raises(NotImplementedError, lambda: solve(f, x)) + + def nona(ans): + return list(filter(lambda x: x is not S.NaN, ans)) + p = Piecewise((x**2 - 4, x < y), (x - 2, True)) + ans = solve(p, x) + assert nona([i.subs(y, -2) for i in ans]) == [2] + assert nona([i.subs(y, 2) for i in ans]) == [-2, 2] + assert nona([i.subs(y, 3) for i in ans]) == [-2, 2] + assert ans == [ + Piecewise((-2, y > -2), (S.NaN, True)), + Piecewise((2, y <= 2), (S.NaN, True)), + Piecewise((2, y > 2), (S.NaN, True))] + + # issue 6060 + absxm3 = Piecewise( + (x - 3, 0 <= x - 3), + (3 - x, 0 > x - 3) + ) + assert solve(absxm3 - y, x) == [ + Piecewise((-y + 3, -y < 0), (S.NaN, True)), + Piecewise((y + 3, y >= 0), (S.NaN, True))] + p = Symbol('p', positive=True) + assert solve(absxm3 - p, x) == [-p + 3, p + 3] + + # issue 6989 + f = Function('f') + assert solve(Eq(-f(x), Piecewise((1, x > 0), (0, True))), f(x)) == \ + [Piecewise((-1, x > 0), (0, True))] + + # issue 8587 + f = Piecewise((2*x**2, And(0 < x, x < 1)), (2, True)) + assert solve(f - 1) == [1/sqrt(2)] + + +def test_piecewise_fold(): + p = Piecewise((x, x < 1), (1, 1 <= x)) + + assert piecewise_fold(x*p) == Piecewise((x**2, x < 1), (x, 1 <= x)) + assert piecewise_fold(p + p) == Piecewise((2*x, x < 1), (2, 1 <= x)) + assert piecewise_fold(Piecewise((1, x < 0), (2, True)) + + Piecewise((10, x < 0), (-10, True))) == \ + Piecewise((11, x < 0), (-8, True)) + + p1 = Piecewise((0, x < 0), (x, x <= 1), (0, True)) + p2 = Piecewise((0, x < 0), (1 - x, x <= 1), (0, True)) + + p = 4*p1 + 2*p2 + assert integrate( + piecewise_fold(p), (x, -oo, oo)) == integrate(2*x + 2, (x, 0, 1)) + + assert piecewise_fold( + Piecewise((1, y <= 0), (-Piecewise((2, y >= 0)), True) + )) == Piecewise((1, y <= 0), (-2, y >= 0)) + + assert piecewise_fold(Piecewise((x, ITE(x > 0, y < 1, y > 1))) + ) == Piecewise((x, ((x <= 0) | (y < 1)) & ((x > 0) | (y > 1)))) + + a, b = (Piecewise((2, Eq(x, 0)), (0, True)), + Piecewise((x, Eq(-x + y, 0)), (1, Eq(-x + y, 1)), (0, True))) + assert piecewise_fold(Mul(a, b, evaluate=False) + ) == piecewise_fold(Mul(b, a, evaluate=False)) + + +def test_piecewise_fold_piecewise_in_cond(): + p1 = Piecewise((cos(x), x < 0), (0, True)) + p2 = Piecewise((0, Eq(p1, 0)), (p1 / Abs(p1), True)) + assert p2.subs(x, -pi/2) == 0 + assert p2.subs(x, 1) == 0 + assert p2.subs(x, -pi/4) == 1 + p4 = Piecewise((0, Eq(p1, 0)), (1,True)) + ans = piecewise_fold(p4) + for i in range(-1, 1): + assert ans.subs(x, i) == p4.subs(x, i) + + r1 = 1 < Piecewise((1, x < 1), (3, True)) + ans = piecewise_fold(r1) + for i in range(2): + assert ans.subs(x, i) == r1.subs(x, i) + + p5 = Piecewise((1, x < 0), (3, True)) + p6 = Piecewise((1, x < 1), (3, True)) + p7 = Piecewise((1, p5 < p6), (0, True)) + ans = piecewise_fold(p7) + for i in range(-1, 2): + assert ans.subs(x, i) == p7.subs(x, i) + + +def test_piecewise_fold_piecewise_in_cond_2(): + p1 = Piecewise((cos(x), x < 0), (0, True)) + p2 = Piecewise((0, Eq(p1, 0)), (1 / p1, True)) + p3 = Piecewise( + (0, (x >= 0) | Eq(cos(x), 0)), + (1/cos(x), x < 0), + (zoo, True)) # redundant b/c all x are already covered + assert(piecewise_fold(p2) == p3) + + +def test_piecewise_fold_expand(): + p1 = Piecewise((1, Interval(0, 1, False, True).contains(x)), (0, True)) + + p2 = piecewise_fold(expand((1 - x)*p1)) + cond = ((x >= 0) & (x < 1)) + assert piecewise_fold(expand((1 - x)*p1), evaluate=False + ) == Piecewise((1 - x, cond), (-x, cond), (1, cond), (0, True), evaluate=False) + assert piecewise_fold(expand((1 - x)*p1), evaluate=None + ) == Piecewise((1 - x, cond), (0, True)) + assert p2 == Piecewise((1 - x, cond), (0, True)) + assert p2 == expand(piecewise_fold((1 - x)*p1)) + + +def test_piecewise_duplicate(): + p = Piecewise((x, x < -10), (x**2, x <= -1), (x, 1 < x)) + assert p == Piecewise(*p.args) + + +def test_doit(): + p1 = Piecewise((x, x < 1), (x**2, -1 <= x), (x, 3 < x)) + p2 = Piecewise((x, x < 1), (Integral(2 * x), -1 <= x), (x, 3 < x)) + assert p2.doit() == p1 + assert p2.doit(deep=False) == p2 + # issue 17165 + p1 = Sum(y**x, (x, -1, oo)).doit() + assert p1.doit() == p1 + + +def test_piecewise_interval(): + p1 = Piecewise((x, Interval(0, 1).contains(x)), (0, True)) + assert p1.subs(x, -0.5) == 0 + assert p1.subs(x, 0.5) == 0.5 + assert p1.diff(x) == Piecewise((1, Interval(0, 1).contains(x)), (0, True)) + assert integrate(p1, x) == Piecewise( + (0, x <= 0), + (x**2/2, x <= 1), + (S.Half, True)) + + +def test_piecewise_exclusive(): + p = Piecewise((0, x < 0), (S.Half, x <= 0), (1, True)) + assert piecewise_exclusive(p) == Piecewise((0, x < 0), (S.Half, Eq(x, 0)), + (1, x > 0), evaluate=False) + assert piecewise_exclusive(p + 2) == Piecewise((0, x < 0), (S.Half, Eq(x, 0)), + (1, x > 0), evaluate=False) + 2 + assert piecewise_exclusive(Piecewise((1, y <= 0), + (-Piecewise((2, y >= 0)), True))) == \ + Piecewise((1, y <= 0), + (-Piecewise((2, y >= 0), + (S.NaN, y < 0), evaluate=False), y > 0), evaluate=False) + assert piecewise_exclusive(Piecewise((1, x > y))) == Piecewise((1, x > y), + (S.NaN, x <= y), + evaluate=False) + assert piecewise_exclusive(Piecewise((1, x > y)), + skip_nan=True) == Piecewise((1, x > y)) + + xr, yr = symbols('xr, yr', real=True) + + p1 = Piecewise((1, xr < 0), (2, True), evaluate=False) + p1x = Piecewise((1, xr < 0), (2, xr >= 0), evaluate=False) + + p2 = Piecewise((p1, yr < 0), (3, True), evaluate=False) + p2x = Piecewise((p1, yr < 0), (3, yr >= 0), evaluate=False) + p2xx = Piecewise((p1x, yr < 0), (3, yr >= 0), evaluate=False) + + assert piecewise_exclusive(p2) == p2xx + assert piecewise_exclusive(p2, deep=False) == p2x + + +def test_piecewise_collapse(): + assert Piecewise((x, True)) == x + a = x < 1 + assert Piecewise((x, a), (x + 1, a)) == Piecewise((x, a)) + assert Piecewise((x, a), (x + 1, a.reversed)) == Piecewise((x, a)) + b = x < 5 + def canonical(i): + if isinstance(i, Piecewise): + return Piecewise(*i.args) + return i + for args in [ + ((1, a), (Piecewise((2, a), (3, b)), b)), + ((1, a), (Piecewise((2, a), (3, b.reversed)), b)), + ((1, a), (Piecewise((2, a), (3, b)), b), (4, True)), + ((1, a), (Piecewise((2, a), (3, b), (4, True)), b)), + ((1, a), (Piecewise((2, a), (3, b), (4, True)), b), (5, True))]: + for i in (0, 2, 10): + assert canonical( + Piecewise(*args, evaluate=False).subs(x, i) + ) == canonical(Piecewise(*args).subs(x, i)) + r1, r2, r3, r4 = symbols('r1:5') + a = x < r1 + b = x < r2 + c = x < r3 + d = x < r4 + assert Piecewise((1, a), (Piecewise( + (2, a), (3, b), (4, c)), b), (5, c) + ) == Piecewise((1, a), (3, b), (5, c)) + assert Piecewise((1, a), (Piecewise( + (2, a), (3, b), (4, c), (6, True)), c), (5, d) + ) == Piecewise((1, a), (Piecewise( + (3, b), (4, c)), c), (5, d)) + assert Piecewise((1, Or(a, d)), (Piecewise( + (2, d), (3, b), (4, c)), b), (5, c) + ) == Piecewise((1, Or(a, d)), (Piecewise( + (2, d), (3, b)), b), (5, c)) + assert Piecewise((1, c), (2, ~c), (3, S.true) + ) == Piecewise((1, c), (2, S.true)) + assert Piecewise((1, c), (2, And(~c, b)), (3,True) + ) == Piecewise((1, c), (2, b), (3, True)) + assert Piecewise((1, c), (2, Or(~c, b)), (3,True) + ).subs(dict(zip((r1, r2, r3, r4, x), (1, 2, 3, 4, 3.5)))) == 2 + assert Piecewise((1, c), (2, ~c)) == Piecewise((1, c), (2, True)) + + +def test_piecewise_lambdify(): + p = Piecewise( + (x**2, x < 0), + (x, Interval(0, 1, False, True).contains(x)), + (2 - x, x >= 1), + (0, True) + ) + + f = lambdify(x, p) + assert f(-2.0) == 4.0 + assert f(0.0) == 0.0 + assert f(0.5) == 0.5 + assert f(2.0) == 0.0 + + +def test_piecewise_series(): + from sympy.series.order import O + p1 = Piecewise((sin(x), x < 0), (cos(x), x > 0)) + p2 = Piecewise((x + O(x**2), x < 0), (1 + O(x**2), x > 0)) + assert p1.nseries(x, n=2) == p2 + + +def test_piecewise_as_leading_term(): + p1 = Piecewise((1/x, x > 1), (0, True)) + p2 = Piecewise((x, x > 1), (0, True)) + p3 = Piecewise((1/x, x > 1), (x, True)) + p4 = Piecewise((x, x > 1), (1/x, True)) + p5 = Piecewise((1/x, x > 1), (x, True)) + p6 = Piecewise((1/x, x < 1), (x, True)) + p7 = Piecewise((x, x < 1), (1/x, True)) + p8 = Piecewise((x, x > 1), (1/x, True)) + assert p1.as_leading_term(x) == 0 + assert p2.as_leading_term(x) == 0 + assert p3.as_leading_term(x) == x + assert p4.as_leading_term(x) == 1/x + assert p5.as_leading_term(x) == x + assert p6.as_leading_term(x) == 1/x + assert p7.as_leading_term(x) == x + assert p8.as_leading_term(x) == 1/x + + +def test_piecewise_complex(): + p1 = Piecewise((2, x < 0), (1, 0 <= x)) + p2 = Piecewise((2*I, x < 0), (I, 0 <= x)) + p3 = Piecewise((I*x, x > 1), (1 + I, True)) + p4 = Piecewise((-I*conjugate(x), x > 1), (1 - I, True)) + + assert conjugate(p1) == p1 + assert conjugate(p2) == piecewise_fold(-p2) + assert conjugate(p3) == p4 + + assert p1.is_imaginary is False + assert p1.is_real is True + assert p2.is_imaginary is True + assert p2.is_real is False + assert p3.is_imaginary is None + assert p3.is_real is None + + assert p1.as_real_imag() == (p1, 0) + assert p2.as_real_imag() == (0, -I*p2) + + +def test_conjugate_transpose(): + A, B = symbols("A B", commutative=False) + p = Piecewise((A*B**2, x > 0), (A**2*B, True)) + assert p.adjoint() == \ + Piecewise((adjoint(A*B**2), x > 0), (adjoint(A**2*B), True)) + assert p.conjugate() == \ + Piecewise((conjugate(A*B**2), x > 0), (conjugate(A**2*B), True)) + assert p.transpose() == \ + Piecewise((transpose(A*B**2), x > 0), (transpose(A**2*B), True)) + + +def test_piecewise_evaluate(): + assert Piecewise((x, True)) == x + assert Piecewise((x, True), evaluate=True) == x + assert Piecewise((1, Eq(1, x))).args == ((1, Eq(x, 1)),) + assert Piecewise((1, Eq(1, x)), evaluate=False).args == ( + (1, Eq(1, x)),) + # like the additive and multiplicative identities that + # cannot be kept in Add/Mul, we also do not keep a single True + p = Piecewise((x, True), evaluate=False) + assert p == x + + +def test_as_expr_set_pairs(): + assert Piecewise((x, x > 0), (-x, x <= 0)).as_expr_set_pairs() == \ + [(x, Interval(0, oo, True, True)), (-x, Interval(-oo, 0))] + + assert Piecewise(((x - 2)**2, x >= 0), (0, True)).as_expr_set_pairs() == \ + [((x - 2)**2, Interval(0, oo)), (0, Interval(-oo, 0, True, True))] + + +def test_S_srepr_is_identity(): + p = Piecewise((10, Eq(x, 0)), (12, True)) + q = S(srepr(p)) + assert p == q + + +def test_issue_12587(): + # sort holes into intervals + p = Piecewise((1, x > 4), (2, Not((x <= 3) & (x > -1))), (3, True)) + assert p.integrate((x, -5, 5)) == 23 + p = Piecewise((1, x > 1), (2, x < y), (3, True)) + lim = x, -3, 3 + ans = p.integrate(lim) + for i in range(-1, 3): + assert ans.subs(y, i) == p.subs(y, i).integrate(lim) + + +def test_issue_11045(): + assert integrate(1/(x*sqrt(x**2 - 1)), (x, 1, 2)) == pi/3 + + # handle And with Or arguments + assert Piecewise((1, And(Or(x < 1, x > 3), x < 2)), (0, True) + ).integrate((x, 0, 3)) == 1 + + # hidden false + assert Piecewise((1, x > 1), (2, x > x + 1), (3, True) + ).integrate((x, 0, 3)) == 5 + # targetcond is Eq + assert Piecewise((1, x > 1), (2, Eq(1, x)), (3, True) + ).integrate((x, 0, 4)) == 6 + # And has Relational needing to be solved + assert Piecewise((1, And(2*x > x + 1, x < 2)), (0, True) + ).integrate((x, 0, 3)) == 1 + # Or has Relational needing to be solved + assert Piecewise((1, Or(2*x > x + 2, x < 1)), (0, True) + ).integrate((x, 0, 3)) == 2 + # ignore hidden false (handled in canonicalization) + assert Piecewise((1, x > 1), (2, x > x + 1), (3, True) + ).integrate((x, 0, 3)) == 5 + # watch for hidden True Piecewise + assert Piecewise((2, Eq(1 - x, x*(1/x - 1))), (0, True) + ).integrate((x, 0, 3)) == 6 + + # overlapping conditions of targetcond are recognized and ignored; + # the condition x > 3 will be pre-empted by the first condition + assert Piecewise((1, Or(x < 1, x > 2)), (2, x > 3), (3, True) + ).integrate((x, 0, 4)) == 6 + + # convert Ne to Or + assert Piecewise((1, Ne(x, 0)), (2, True) + ).integrate((x, -1, 1)) == 2 + + # no default but well defined + assert Piecewise((x, (x > 1) & (x < 3)), (1, (x < 4)) + ).integrate((x, 1, 4)) == 5 + + p = Piecewise((x, (x > 1) & (x < 3)), (1, (x < 4))) + nan = Undefined + i = p.integrate((x, 1, y)) + assert i == Piecewise( + (y - 1, y < 1), + (Min(3, y)**2/2 - Min(3, y) + Min(4, y) - S.Half, + y <= Min(4, y)), + (nan, True)) + assert p.integrate((x, 1, -1)) == i.subs(y, -1) + assert p.integrate((x, 1, 4)) == 5 + assert p.integrate((x, 1, 5)) is nan + + # handle Not + p = Piecewise((1, x > 1), (2, Not(And(x > 1, x< 3))), (3, True)) + assert p.integrate((x, 0, 3)) == 4 + + # handle updating of int_expr when there is overlap + p = Piecewise( + (1, And(5 > x, x > 1)), + (2, Or(x < 3, x > 7)), + (4, x < 8)) + assert p.integrate((x, 0, 10)) == 20 + + # And with Eq arg handling + assert Piecewise((1, x < 1), (2, And(Eq(x, 3), x > 1)) + ).integrate((x, 0, 3)) is S.NaN + assert Piecewise((1, x < 1), (2, And(Eq(x, 3), x > 1)), (3, True) + ).integrate((x, 0, 3)) == 7 + assert Piecewise((1, x < 0), (2, And(Eq(x, 3), x < 1)), (3, True) + ).integrate((x, -1, 1)) == 4 + # middle condition doesn't matter: it's a zero width interval + assert Piecewise((1, x < 1), (2, Eq(x, 3) & (y < x)), (3, True) + ).integrate((x, 0, 3)) == 7 + + +def test_holes(): + nan = Undefined + assert Piecewise((1, x < 2)).integrate(x) == Piecewise( + (x, x < 2), (nan, True)) + assert Piecewise((1, And(x > 1, x < 2))).integrate(x) == Piecewise( + (nan, x < 1), (x, x < 2), (nan, True)) + assert Piecewise((1, And(x > 1, x < 2))).integrate((x, 0, 3)) is nan + assert Piecewise((1, And(x > 0, x < 4))).integrate((x, 1, 3)) == 2 + + # this also tests that the integrate method is used on non-Piecwise + # arguments in _eval_integral + A, B = symbols("A B") + a, b = symbols('a b', real=True) + assert Piecewise((A, And(x < 0, a < 1)), (B, Or(x < 1, a > 2)) + ).integrate(x) == Piecewise( + (B*x, (a > 2)), + (Piecewise((A*x, x < 0), (B*x, x < 1), (nan, True)), a < 1), + (Piecewise((B*x, x < 1), (nan, True)), True)) + + +def test_issue_11922(): + def f(x): + return Piecewise((0, x < -1), (1 - x**2, x < 1), (0, True)) + autocorr = lambda k: ( + f(x) * f(x + k)).integrate((x, -1, 1)) + assert autocorr(1.9) > 0 + k = symbols('k') + good_autocorr = lambda k: ( + (1 - x**2) * f(x + k)).integrate((x, -1, 1)) + a = good_autocorr(k) + assert a.subs(k, 3) == 0 + k = symbols('k', positive=True) + a = good_autocorr(k) + assert a.subs(k, 3) == 0 + assert Piecewise((0, x < 1), (10, (x >= 1)) + ).integrate() == Piecewise((0, x < 1), (10*x - 10, True)) + + +def test_issue_5227(): + f = 0.0032513612725229*Piecewise((0, x < -80.8461538461539), + (-0.0160799238820171*x + 1.33215984776403, x < 2), + (Piecewise((0.3, x > 123), (0.7, True)) + + Piecewise((0.4, x > 2), (0.6, True)), x <= + 123), (-0.00817409766454352*x + 2.10541401273885, x < + 380.571428571429), (0, True)) + i = integrate(f, (x, -oo, oo)) + assert i == Integral(f, (x, -oo, oo)).doit() + assert str(i) == '1.00195081676351' + assert Piecewise((1, x - y < 0), (0, True) + ).integrate(y) == Piecewise((0, y <= x), (-x + y, True)) + + +def test_issue_10137(): + a = Symbol('a', real=True) + b = Symbol('b', real=True) + x = Symbol('x', real=True) + y = Symbol('y', real=True) + p0 = Piecewise((0, Or(x < a, x > b)), (1, True)) + p1 = Piecewise((0, Or(a > x, b < x)), (1, True)) + assert integrate(p0, (x, y, oo)) == integrate(p1, (x, y, oo)) + p3 = Piecewise((1, And(0 < x, x < a)), (0, True)) + p4 = Piecewise((1, And(a > x, x > 0)), (0, True)) + ip3 = integrate(p3, x) + assert ip3 == Piecewise( + (0, x <= 0), + (x, x <= Max(0, a)), + (Max(0, a), True)) + ip4 = integrate(p4, x) + assert ip4 == ip3 + assert p3.integrate((x, 2, 4)) == Min(4, Max(2, a)) - 2 + assert p4.integrate((x, 2, 4)) == Min(4, Max(2, a)) - 2 + + +def test_stackoverflow_43852159(): + f = lambda x: Piecewise((1, (x >= -1) & (x <= 1)), (0, True)) + Conv = lambda x: integrate(f(x - y)*f(y), (y, -oo, +oo)) + cx = Conv(x) + assert cx.subs(x, -1.5) == cx.subs(x, 1.5) + assert cx.subs(x, 3) == 0 + assert piecewise_fold(f(x - y)*f(y)) == Piecewise( + (1, (y >= -1) & (y <= 1) & (x - y >= -1) & (x - y <= 1)), + (0, True)) + + +def test_issue_12557(): + ''' + # 3200 seconds to compute the fourier part of issue + import sympy as sym + x,y,z,t = sym.symbols('x y z t') + k = sym.symbols("k", integer=True) + fourier = sym.fourier_series(sym.cos(k*x)*sym.sqrt(x**2), + (x, -sym.pi, sym.pi)) + assert fourier == FourierSeries( + sqrt(x**2)*cos(k*x), (x, -pi, pi), (Piecewise((pi**2, + Eq(k, 0)), (2*(-1)**k/k**2 - 2/k**2, True))/(2*pi), + SeqFormula(Piecewise((pi**2, (Eq(_n, 0) & Eq(k, 0)) | (Eq(_n, 0) & + Eq(_n, k) & Eq(k, 0)) | (Eq(_n, 0) & Eq(k, 0) & Eq(_n, -k)) | (Eq(_n, + 0) & Eq(_n, k) & Eq(k, 0) & Eq(_n, -k))), (pi**2/2, Eq(_n, k) | Eq(_n, + -k) | (Eq(_n, 0) & Eq(_n, k)) | (Eq(_n, k) & Eq(k, 0)) | (Eq(_n, 0) & + Eq(_n, -k)) | (Eq(_n, k) & Eq(_n, -k)) | (Eq(k, 0) & Eq(_n, -k)) | + (Eq(_n, 0) & Eq(_n, k) & Eq(_n, -k)) | (Eq(_n, k) & Eq(k, 0) & Eq(_n, + -k))), ((-1)**k*pi**2*_n**3*sin(pi*_n)/(pi*_n**4 - 2*pi*_n**2*k**2 + + pi*k**4) - (-1)**k*pi**2*_n**3*sin(pi*_n)/(-pi*_n**4 + 2*pi*_n**2*k**2 + - pi*k**4) + (-1)**k*pi*_n**2*cos(pi*_n)/(pi*_n**4 - 2*pi*_n**2*k**2 + + pi*k**4) - (-1)**k*pi*_n**2*cos(pi*_n)/(-pi*_n**4 + 2*pi*_n**2*k**2 - + pi*k**4) - (-1)**k*pi**2*_n*k**2*sin(pi*_n)/(pi*_n**4 - + 2*pi*_n**2*k**2 + pi*k**4) + + (-1)**k*pi**2*_n*k**2*sin(pi*_n)/(-pi*_n**4 + 2*pi*_n**2*k**2 - + pi*k**4) + (-1)**k*pi*k**2*cos(pi*_n)/(pi*_n**4 - 2*pi*_n**2*k**2 + + pi*k**4) - (-1)**k*pi*k**2*cos(pi*_n)/(-pi*_n**4 + 2*pi*_n**2*k**2 - + pi*k**4) - (2*_n**2 + 2*k**2)/(_n**4 - 2*_n**2*k**2 + k**4), + True))*cos(_n*x)/pi, (_n, 1, oo)), SeqFormula(0, (_k, 1, oo)))) + ''' + x = symbols("x", real=True) + k = symbols('k', integer=True, finite=True) + abs2 = lambda x: Piecewise((-x, x <= 0), (x, x > 0)) + assert integrate(abs2(x), (x, -pi, pi)) == pi**2 + func = cos(k*x)*sqrt(x**2) + assert integrate(func, (x, -pi, pi)) == Piecewise( + (2*(-1)**k/k**2 - 2/k**2, Ne(k, 0)), (pi**2, True)) + +def test_issue_6900(): + from itertools import permutations + t0, t1, T, t = symbols('t0, t1 T t') + f = Piecewise((0, t < t0), (x, And(t0 <= t, t < t1)), (0, t >= t1)) + g = f.integrate(t) + assert g == Piecewise( + (0, t <= t0), + (t*x - t0*x, t <= Max(t0, t1)), + (-t0*x + x*Max(t0, t1), True)) + for i in permutations(range(2)): + reps = dict(zip((t0,t1), i)) + for tt in range(-1,3): + assert (g.xreplace(reps).subs(t,tt) == + f.xreplace(reps).integrate(t).subs(t,tt)) + lim = Tuple(t, t0, T) + g = f.integrate(lim) + ans = Piecewise( + (-t0*x + x*Min(T, Max(t0, t1)), T > t0), + (0, True)) + for i in permutations(range(3)): + reps = dict(zip((t0,t1,T), i)) + tru = f.xreplace(reps).integrate(lim.xreplace(reps)) + assert tru == ans.xreplace(reps) + assert g == ans + + +def test_issue_10122(): + assert solve(abs(x) + abs(x - 1) - 1 > 0, x + ) == Or(And(-oo < x, x < S.Zero), And(S.One < x, x < oo)) + + +def test_issue_4313(): + u = Piecewise((0, x <= 0), (1, x >= a), (x/a, True)) + e = (u - u.subs(x, y))**2/(x - y)**2 + M = Max(0, a) + assert integrate(e, x).expand() == Piecewise( + (Piecewise( + (0, x <= 0), + (-y**2/(a**2*x - a**2*y) + x/a**2 - 2*y*log(-y)/a**2 + + 2*y*log(x - y)/a**2 - y/a**2, x <= M), + (-y**2/(-a**2*y + a**2*M) + 1/(-y + M) - + 1/(x - y) - 2*y*log(-y)/a**2 + 2*y*log(-y + + M)/a**2 - y/a**2 + M/a**2, True)), + ((a <= y) & (y <= 0)) | ((y <= 0) & (y > -oo))), + (Piecewise( + (-1/(x - y), x <= 0), + (-a**2/(a**2*x - a**2*y) + 2*a*y/(a**2*x - a**2*y) - + y**2/(a**2*x - a**2*y) + 2*log(-y)/a - 2*log(x - y)/a + + 2/a + x/a**2 - 2*y*log(-y)/a**2 + 2*y*log(x - y)/a**2 - + y/a**2, x <= M), + (-a**2/(-a**2*y + a**2*M) + 2*a*y/(-a**2*y + + a**2*M) - y**2/(-a**2*y + a**2*M) + + 2*log(-y)/a - 2*log(-y + M)/a + 2/a - + 2*y*log(-y)/a**2 + 2*y*log(-y + M)/a**2 - + y/a**2 + M/a**2, True)), + a <= y), + (Piecewise( + (-y**2/(a**2*x - a**2*y), x <= 0), + (x/a**2 + y/a**2, x <= M), + (a**2/(-a**2*y + a**2*M) - + a**2/(a**2*x - a**2*y) - 2*a*y/(-a**2*y + a**2*M) + + 2*a*y/(a**2*x - a**2*y) + y**2/(-a**2*y + a**2*M) - + y**2/(a**2*x - a**2*y) + y/a**2 + M/a**2, True)), + True)) + + +def test__intervals(): + assert Piecewise((x + 2, Eq(x, 3)))._intervals(x) == (True, []) + assert Piecewise( + (1, x > x + 1), + (Piecewise((1, x < x + 1)), 2*x < 2*x + 1), + (1, True))._intervals(x) == (True, [(-oo, oo, 1, 1)]) + assert Piecewise((1, Ne(x, I)), (0, True))._intervals(x) == (True, + [(-oo, oo, 1, 0)]) + assert Piecewise((-cos(x), sin(x) >= 0), (cos(x), True) + )._intervals(x) == (True, + [(0, pi, -cos(x), 0), (-oo, oo, cos(x), 1)]) + # the following tests that duplicates are removed and that non-Eq + # generated zero-width intervals are removed + assert Piecewise((1, Abs(x**(-2)) > 1), (0, True) + )._intervals(x) == (True, + [(-1, 0, 1, 0), (0, 1, 1, 0), (-oo, oo, 0, 1)]) + + +def test_containment(): + a, b, c, d, e = [1, 2, 3, 4, 5] + p = (Piecewise((d, x > 1), (e, True))* + Piecewise((a, Abs(x - 1) < 1), (b, Abs(x - 2) < 2), (c, True))) + assert p.integrate(x).diff(x) == Piecewise( + (c*e, x <= 0), + (a*e, x <= 1), + (a*d, x < 2), # this is what we want to get right + (b*d, x < 4), + (c*d, True)) + + +def test_piecewise_with_DiracDelta(): + d1 = DiracDelta(x - 1) + assert integrate(d1, (x, -oo, oo)) == 1 + assert integrate(d1, (x, 0, 2)) == 1 + assert Piecewise((d1, Eq(x, 2)), (0, True)).integrate(x) == 0 + assert Piecewise((d1, x < 2), (0, True)).integrate(x) == Piecewise( + (Heaviside(x - 1), x < 2), (1, True)) + # TODO raise error if function is discontinuous at limit of + # integration, e.g. integrate(d1, (x, -2, 1)) or Piecewise( + # (d1, Eq(x, 1) + + +def test_issue_10258(): + assert Piecewise((0, x < 1), (1, True)).is_zero is None + assert Piecewise((-1, x < 1), (1, True)).is_zero is False + a = Symbol('a', zero=True) + assert Piecewise((0, x < 1), (a, True)).is_zero + assert Piecewise((1, x < 1), (a, x < 3)).is_zero is None + a = Symbol('a') + assert Piecewise((0, x < 1), (a, True)).is_zero is None + assert Piecewise((0, x < 1), (1, True)).is_nonzero is None + assert Piecewise((1, x < 1), (2, True)).is_nonzero + assert Piecewise((0, x < 1), (oo, True)).is_finite is None + assert Piecewise((0, x < 1), (1, True)).is_finite + b = Basic() + assert Piecewise((b, x < 1)).is_finite is None + + # 10258 + c = Piecewise((1, x < 0), (2, True)) < 3 + assert c != True + assert piecewise_fold(c) == True + + +def test_issue_10087(): + a, b = Piecewise((x, x > 1), (2, True)), Piecewise((x, x > 3), (3, True)) + m = a*b + f = piecewise_fold(m) + for i in (0, 2, 4): + assert m.subs(x, i) == f.subs(x, i) + m = a + b + f = piecewise_fold(m) + for i in (0, 2, 4): + assert m.subs(x, i) == f.subs(x, i) + + +def test_issue_8919(): + c = symbols('c:5') + x = symbols("x") + f1 = Piecewise((c[1], x < 1), (c[2], True)) + f2 = Piecewise((c[3], x < Rational(1, 3)), (c[4], True)) + assert integrate(f1*f2, (x, 0, 2) + ) == c[1]*c[3]/3 + 2*c[1]*c[4]/3 + c[2]*c[4] + f1 = Piecewise((0, x < 1), (2, True)) + f2 = Piecewise((3, x < 2), (0, True)) + assert integrate(f1*f2, (x, 0, 3)) == 6 + + y = symbols("y", positive=True) + a, b, c, x, z = symbols("a,b,c,x,z", real=True) + I = Integral(Piecewise( + (0, (x >= y) | (x < 0) | (b > c)), + (a, True)), (x, 0, z)) + ans = I.doit() + assert ans == Piecewise((0, b > c), (a*Min(y, z) - a*Min(0, z), True)) + for cond in (True, False): + for yy in range(1, 3): + for zz in range(-yy, 0, yy): + reps = [(b > c, cond), (y, yy), (z, zz)] + assert ans.subs(reps) == I.subs(reps).doit() + + +def test_unevaluated_integrals(): + f = Function('f') + p = Piecewise((1, Eq(f(x) - 1, 0)), (2, x - 10 < 0), (0, True)) + assert p.integrate(x) == Integral(p, x) + assert p.integrate((x, 0, 5)) == Integral(p, (x, 0, 5)) + # test it by replacing f(x) with x%2 which will not + # affect the answer: the integrand is essentially 2 over + # the domain of integration + assert Integral(p, (x, 0, 5)).subs(f(x), x%2).n() == 10.0 + + # this is a test of using _solve_inequality when + # solve_univariate_inequality fails + assert p.integrate(y) == Piecewise( + (y, Eq(f(x), 1) | ((x < 10) & Eq(f(x), 1))), + (2*y, (x > -oo) & (x < 10)), (0, True)) + + +def test_conditions_as_alternate_booleans(): + a, b, c = symbols('a:c') + assert Piecewise((x, Piecewise((y < 1, x > 0), (y > 1, True))) + ) == Piecewise((x, ITE(x > 0, y < 1, y > 1))) + + +def test_Piecewise_rewrite_as_ITE(): + a, b, c, d = symbols('a:d') + + def _ITE(*args): + return Piecewise(*args).rewrite(ITE) + + assert _ITE((a, x < 1), (b, x >= 1)) == ITE(x < 1, a, b) + assert _ITE((a, x < 1), (b, x < oo)) == ITE(x < 1, a, b) + assert _ITE((a, x < 1), (b, Or(y < 1, x < oo)), (c, y > 0) + ) == ITE(x < 1, a, b) + assert _ITE((a, x < 1), (b, True)) == ITE(x < 1, a, b) + assert _ITE((a, x < 1), (b, x < 2), (c, True) + ) == ITE(x < 1, a, ITE(x < 2, b, c)) + assert _ITE((a, x < 1), (b, y < 2), (c, True) + ) == ITE(x < 1, a, ITE(y < 2, b, c)) + assert _ITE((a, x < 1), (b, x < oo), (c, y < 1) + ) == ITE(x < 1, a, b) + assert _ITE((a, x < 1), (c, y < 1), (b, x < oo), (d, True) + ) == ITE(x < 1, a, ITE(y < 1, c, b)) + assert _ITE((a, x < 0), (b, Or(x < oo, y < 1)) + ) == ITE(x < 0, a, b) + raises(TypeError, lambda: _ITE((x + 1, x < 1), (x, True))) + # if `a` in the following were replaced with y then the coverage + # is complete but something other than as_set would need to be + # used to detect this + raises(NotImplementedError, lambda: _ITE((x, x < y), (y, x >= a))) + raises(ValueError, lambda: _ITE((a, x < 2), (b, x > 3))) + + +def test_Piecewise_replace_relational_27538(): + x, y = symbols('x, y') + p1 = Piecewise( + (0, Eq(x, True)), + (1, True), + ) + p2 = p1.xreplace({x: y < 1}) + assert p2.subs(y, 0) == 0 + assert p2.subs(y, 1) == 1 + + +def test_issue_14052(): + assert integrate(abs(sin(x)), (x, 0, 2*pi)) == 4 + + +def test_issue_14240(): + assert piecewise_fold( + Piecewise((1, a), (2, b), (4, True)) + + Piecewise((8, a), (16, True)) + ) == Piecewise((9, a), (18, b), (20, True)) + assert piecewise_fold( + Piecewise((2, a), (3, b), (5, True)) * + Piecewise((7, a), (11, True)) + ) == Piecewise((14, a), (33, b), (55, True)) + # these will hang if naive folding is used + assert piecewise_fold(Add(*[ + Piecewise((i, a), (0, True)) for i in range(40)]) + ) == Piecewise((780, a), (0, True)) + assert piecewise_fold(Mul(*[ + Piecewise((i, a), (0, True)) for i in range(1, 41)]) + ) == Piecewise((factorial(40), a), (0, True)) + + +def test_issue_14787(): + x = Symbol('x') + f = Piecewise((x, x < 1), ((S(58) / 7), True)) + assert str(f.evalf()) == "Piecewise((x, x < 1), (8.28571428571429, True))" + +def test_issue_21481(): + b, e = symbols('b e') + C = Piecewise( + (2, + ((b > 1) & (e > 0)) | + ((b > 0) & (b < 1) & (e < 0)) | + ((e >= 2) & (b < -1) & Eq(Mod(e, 2), 0)) | + ((e <= -2) & (b > -1) & (b < 0) & Eq(Mod(e, 2), 0))), + (S.Half, + ((b > 1) & (e < 0)) | + ((b > 0) & (e > 0) & (b < 1)) | + ((e <= -2) & (b < -1) & Eq(Mod(e, 2), 0)) | + ((e >= 2) & (b > -1) & (b < 0) & Eq(Mod(e, 2), 0))), + (-S.Half, + Eq(Mod(e, 2), 1) & + (((e <= -1) & (b < -1)) | ((e >= 1) & (b > -1) & (b < 0)))), + (-2, + ((e >= 1) & (b < -1) & Eq(Mod(e, 2), 1)) | + ((e <= -1) & (b > -1) & (b < 0) & Eq(Mod(e, 2), 1))) + ) + A = Piecewise( + (1, Eq(b, 1) | Eq(e, 0) | (Eq(b, -1) & Eq(Mod(e, 2), 0))), + (0, Eq(b, 0) & (e > 0)), + (-1, Eq(b, -1) & Eq(Mod(e, 2), 1)), + (C, Eq(im(b), 0) & Eq(im(e), 0)) + ) + + B = piecewise_fold(A) + sa = A.simplify() + sb = B.simplify() + v = (-2, -1, -S.Half, 0, S.Half, 1, 2) + for i in v: + for j in v: + r = {b:i, e:j} + ok = [k.xreplace(r) for k in (A, B, sa, sb)] + assert len(set(ok)) == 1 + + +def test_issue_8458(): + x, y = symbols('x y') + # Original issue + p1 = Piecewise((0, Eq(x, 0)), (sin(x), True)) + assert p1.simplify() == sin(x) + # Slightly larger variant + p2 = Piecewise((x, Eq(x, 0)), (4*x + (y-2)**4, Eq(x, 0) & Eq(x+y, 2)), (sin(x), True)) + assert p2.simplify() == sin(x) + # Test for problem highlighted during review + p3 = Piecewise((x+1, Eq(x, -1)), (4*x + (y-2)**4, Eq(x, 0) & Eq(x+y, 2)), (sin(x), True)) + assert p3.simplify() == Piecewise((0, Eq(x, -1)), (sin(x), True)) + + +def test_issue_16417(): + z = Symbol('z') + assert unchanged(Piecewise, (1, Or(Eq(im(z), 0), Gt(re(z), 0))), (2, True)) + + x = Symbol('x') + assert unchanged(Piecewise, (S.Pi, re(x) < 0), + (0, Or(re(x) > 0, Ne(im(x), 0))), + (S.NaN, True)) + r = Symbol('r', real=True) + p = Piecewise((S.Pi, re(r) < 0), + (0, Or(re(r) > 0, Ne(im(r), 0))), + (S.NaN, True)) + assert p == Piecewise((S.Pi, r < 0), + (0, r > 0), + (S.NaN, True), evaluate=False) + # Does not work since imaginary != 0... + #i = Symbol('i', imaginary=True) + #p = Piecewise((S.Pi, re(i) < 0), + # (0, Or(re(i) > 0, Ne(im(i), 0))), + # (S.NaN, True)) + #assert p == Piecewise((0, Ne(im(i), 0)), + # (S.NaN, True), evaluate=False) + i = I*r + p = Piecewise((S.Pi, re(i) < 0), + (0, Or(re(i) > 0, Ne(im(i), 0))), + (S.NaN, True)) + assert p == Piecewise((0, Ne(im(i), 0)), + (S.NaN, True), evaluate=False) + assert p == Piecewise((0, Ne(r, 0)), + (S.NaN, True), evaluate=False) + + +def test_eval_rewrite_as_KroneckerDelta(): + x, y, z, n, t, m = symbols('x y z n t m') + K = KroneckerDelta + f = lambda p: expand(p.rewrite(K)) + + p1 = Piecewise((0, Eq(x, y)), (1, True)) + assert f(p1) == 1 - K(x, y) + + p2 = Piecewise((x, Eq(y,0)), (z, Eq(t,0)), (n, True)) + assert f(p2) == n*K(0, t)*K(0, y) - n*K(0, t) - n*K(0, y) + n + \ + x*K(0, y) - z*K(0, t)*K(0, y) + z*K(0, t) + + p3 = Piecewise((1, Ne(x, y)), (0, True)) + assert f(p3) == 1 - K(x, y) + + p4 = Piecewise((1, Eq(x, 3)), (4, True), (5, True)) + assert f(p4) == 4 - 3*K(3, x) + + p5 = Piecewise((3, Ne(x, 2)), (4, Eq(y, 2)), (5, True)) + assert f(p5) == -K(2, x)*K(2, y) + 2*K(2, x) + 3 + + p6 = Piecewise((0, Ne(x, 1) & Ne(y, 4)), (1, True)) + assert f(p6) == -K(1, x)*K(4, y) + K(1, x) + K(4, y) + + p7 = Piecewise((2, Eq(y, 3) & Ne(x, 2)), (1, True)) + assert f(p7) == -K(2, x)*K(3, y) + K(3, y) + 1 + + p8 = Piecewise((4, Eq(x, 3) & Ne(y, 2)), (1, True)) + assert f(p8) == -3*K(2, y)*K(3, x) + 3*K(3, x) + 1 + + p9 = Piecewise((6, Eq(x, 4) & Eq(y, 1)), (1, True)) + assert f(p9) == 5 * K(1, y) * K(4, x) + 1 + + p10 = Piecewise((4, Ne(x, -4) | Ne(y, 1)), (1, True)) + assert f(p10) == -3 * K(-4, x) * K(1, y) + 4 + + p11 = Piecewise((1, Eq(y, 2) | Ne(x, -3)), (2, True)) + assert f(p11) == -K(-3, x)*K(2, y) + K(-3, x) + 1 + + p12 = Piecewise((-1, Eq(x, 1) | Ne(y, 3)), (1, True)) + assert f(p12) == -2*K(1, x)*K(3, y) + 2*K(3, y) - 1 + + p13 = Piecewise((3, Eq(x, 2) | Eq(y, 4)), (1, True)) + assert f(p13) == -2*K(2, x)*K(4, y) + 2*K(2, x) + 2*K(4, y) + 1 + + p14 = Piecewise((1, Ne(x, 0) | Ne(y, 1)), (3, True)) + assert f(p14) == 2 * K(0, x) * K(1, y) + 1 + + p15 = Piecewise((2, Eq(x, 3) | Ne(y, 2)), (3, Eq(x, 4) & Eq(y, 5)), (1, True)) + assert f(p15) == -2*K(2, y)*K(3, x)*K(4, x)*K(5, y) + K(2, y)*K(3, x) + \ + 2*K(2, y)*K(4, x)*K(5, y) - K(2, y) + 2 + + p16 = Piecewise((0, Ne(m, n)), (1, True))*Piecewise((0, Ne(n, t)), (1, True))\ + *Piecewise((0, Ne(n, x)), (1, True)) - Piecewise((0, Ne(t, x)), (1, True)) + assert f(p16) == K(m, n)*K(n, t)*K(n, x) - K(t, x) + + p17 = Piecewise((0, Ne(t, x) & (Ne(m, n) | Ne(n, t) | Ne(n, x))), + (1, Ne(t, x)), (-1, Ne(m, n) | Ne(n, t) | Ne(n, x)), (0, True)) + assert f(p17) == K(m, n)*K(n, t)*K(n, x) - K(t, x) + + p18 = Piecewise((-4, Eq(y, 1) | (Eq(x, -5) & Eq(x, z))), (4, True)) + assert f(p18) == 8*K(-5, x)*K(1, y)*K(x, z) - 8*K(-5, x)*K(x, z) - 8*K(1, y) + 4 + + p19 = Piecewise((0, x > 2), (1, True)) + assert f(p19) == p19 + + p20 = Piecewise((0, And(x < 2, x > -5)), (1, True)) + assert f(p20) == p20 + + p21 = Piecewise((0, Or(x > 1, x < 0)), (1, True)) + assert f(p21) == p21 + + p22 = Piecewise((0, ~((Eq(y, -1) | Ne(x, 0)) & (Ne(x, 1) | Ne(y, -1)))), (1, True)) + assert f(p22) == K(-1, y)*K(0, x) - K(-1, y)*K(1, x) - K(0, x) + 1 + + +@slow +def test_identical_conds_issue(): + from sympy.stats import Uniform, density + u1 = Uniform('u1', 0, 1) + u2 = Uniform('u2', 0, 1) + # Result is quite big, so not really important here (and should ideally be + # simpler). Should not give an exception though. + density(u1 + u2) + + +def test_issue_7370(): + f = Piecewise((1, x <= 2400)) + v = integrate(f, (x, 0, Float("252.4", 30))) + assert str(v) == '252.400000000000000000000000000' + + +def test_issue_14933(): + x = Symbol('x') + y = Symbol('y') + + inp = MatrixSymbol('inp', 1, 1) + rep_dict = {y: inp[0, 0], x: inp[0, 0]} + + p = Piecewise((1, ITE(y > 0, x < 0, True))) + assert p.xreplace(rep_dict) == Piecewise((1, ITE(inp[0, 0] > 0, inp[0, 0] < 0, True))) + + +def test_issue_16715(): + raises(NotImplementedError, lambda: Piecewise((x, x<0), (0, y>1)).as_expr_set_pairs()) + + +def test_issue_20360(): + t, tau = symbols("t tau", real=True) + n = symbols("n", integer=True) + lam = pi * (n - S.Half) + eq = integrate(exp(lam * tau), (tau, 0, t)) + assert eq.simplify() == (2*exp(pi*t*(2*n - 1)/2) - 2)/(pi*(2*n - 1)) + + +def test_piecewise_eval(): + # XXX these tests might need modification if this + # simplification is moved out of eval and into + # boolalg or Piecewise simplification functions + f = lambda x: x.args[0].cond + # unsimplified + assert f(Piecewise((x, (x > -oo) & (x < 3))) + ) == ((x > -oo) & (x < 3)) + assert f(Piecewise((x, (x > -oo) & (x < oo))) + ) == ((x > -oo) & (x < oo)) + assert f(Piecewise((x, (x > -3) & (x < 3))) + ) == ((x > -3) & (x < 3)) + assert f(Piecewise((x, (x > -3) & (x < oo))) + ) == ((x > -3) & (x < oo)) + assert f(Piecewise((x, (x <= 3) & (x > -oo))) + ) == ((x <= 3) & (x > -oo)) + assert f(Piecewise((x, (x <= 3) & (x > -3))) + ) == ((x <= 3) & (x > -3)) + assert f(Piecewise((x, (x >= -3) & (x < 3))) + ) == ((x >= -3) & (x < 3)) + assert f(Piecewise((x, (x >= -3) & (x < oo))) + ) == ((x >= -3) & (x < oo)) + assert f(Piecewise((x, (x >= -3) & (x <= 3))) + ) == ((x >= -3) & (x <= 3)) + # could simplify by keeping only the first + # arg of result + assert f(Piecewise((x, (x <= oo) & (x > -oo))) + ) == (x > -oo) & (x <= oo) + assert f(Piecewise((x, (x <= oo) & (x > -3))) + ) == (x > -3) & (x <= oo) + assert f(Piecewise((x, (x >= -oo) & (x < 3))) + ) == (x < 3) & (x >= -oo) + assert f(Piecewise((x, (x >= -oo) & (x < oo))) + ) == (x < oo) & (x >= -oo) + assert f(Piecewise((x, (x >= -oo) & (x <= 3))) + ) == (x <= 3) & (x >= -oo) + assert f(Piecewise((x, (x >= -oo) & (x <= oo))) + ) == (x <= oo) & (x >= -oo) # but cannot be True unless x is real + assert f(Piecewise((x, (x >= -3) & (x <= oo))) + ) == (x >= -3) & (x <= oo) + assert f(Piecewise((x, (Abs(arg(a)) <= 1) | (Abs(arg(a)) < 1))) + ) == (Abs(arg(a)) <= 1) | (Abs(arg(a)) < 1) + + +def test_issue_22533(): + x = Symbol('x', real=True) + f = Piecewise((-1 / x, x <= 0), (1 / x, True)) + assert integrate(f, x) == Piecewise((-log(x), x <= 0), (log(x), True)) + + +def test_issue_24072(): + assert Piecewise((1, x > 1), (2, x <= 1), (3, x <= 1) + ) == Piecewise((1, x > 1), (2, True)) + + +def test_piecewise__eval_is_meromorphic(): + """ Issue 24127: Tests eval_is_meromorphic auxiliary method """ + x = symbols('x', real=True) + f = Piecewise((1, x < 0), (sqrt(1 - x), True)) + assert f.is_meromorphic(x, I) is None + assert f.is_meromorphic(x, -1) == True + assert f.is_meromorphic(x, 0) == None + assert f.is_meromorphic(x, 1) == False + assert f.is_meromorphic(x, 2) == True + assert f.is_meromorphic(x, Symbol('a')) == None + assert f.is_meromorphic(x, Symbol('a', real=True)) == None diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_trigonometric.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_trigonometric.py new file mode 100644 index 0000000000000000000000000000000000000000..815f424093aac72ee3a078d8ce62e5c195a625dc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/tests/test_trigonometric.py @@ -0,0 +1,2236 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.core.add import Add +from sympy.core.function import (Lambda, diff) +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core.numbers import (E, Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (arg, conjugate, im, re) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (acoth, asinh, atanh, cosh, coth, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, acot, acsc, asec, asin, atan, atan2, + cos, cot, csc, sec, sin, sinc, tan) +from sympy.functions.special.bessel import (besselj, jn) +from sympy.functions.special.delta_functions import Heaviside +from sympy.matrices.dense import Matrix +from sympy.polys.polytools import (cancel, gcd) +from sympy.series.limits import limit +from sympy.series.order import O +from sympy.series.series import series +from sympy.sets.fancysets import ImageSet +from sympy.sets.sets import (FiniteSet, Interval) +from sympy.simplify.simplify import simplify +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError, PoleError +from sympy.core.relational import Ne, Eq +from sympy.functions.elementary.piecewise import Piecewise +from sympy.sets.setexpr import SetExpr +from sympy.testing.pytest import XFAIL, slow, raises + + +x, y, z = symbols('x y z') +r = Symbol('r', real=True) +k, m = symbols('k m', integer=True) +p = Symbol('p', positive=True) +n = Symbol('n', negative=True) +np = Symbol('p', nonpositive=True) +nn = Symbol('n', nonnegative=True) +nz = Symbol('nz', nonzero=True) +ep = Symbol('ep', extended_positive=True) +en = Symbol('en', extended_negative=True) +enp = Symbol('ep', extended_nonpositive=True) +enn = Symbol('en', extended_nonnegative=True) +enz = Symbol('enz', extended_nonzero=True) +a = Symbol('a', algebraic=True) +na = Symbol('na', nonzero=True, algebraic=True) + + +def test_sin(): + x, y = symbols('x y') + z = symbols('z', imaginary=True) + + assert sin.nargs == FiniteSet(1) + assert sin(nan) is nan + assert sin(zoo) is nan + + assert sin(oo) == AccumBounds(-1, 1) + assert sin(oo) - sin(oo) == AccumBounds(-2, 2) + assert sin(oo*I) == oo*I + assert sin(-oo*I) == -oo*I + assert 0*sin(oo) is S.Zero + assert 0/sin(oo) is S.Zero + assert 0 + sin(oo) == AccumBounds(-1, 1) + assert 5 + sin(oo) == AccumBounds(4, 6) + + assert sin(0) == 0 + + assert sin(z*I) == I*sinh(z) + assert sin(asin(x)) == x + assert sin(atan(x)) == x / sqrt(1 + x**2) + assert sin(acos(x)) == sqrt(1 - x**2) + assert sin(acot(x)) == 1 / (sqrt(1 + 1 / x**2) * x) + assert sin(acsc(x)) == 1 / x + assert sin(asec(x)) == sqrt(1 - 1 / x**2) + assert sin(atan2(y, x)) == y / sqrt(x**2 + y**2) + + assert sin(pi*I) == sinh(pi)*I + assert sin(-pi*I) == -sinh(pi)*I + assert sin(-2*I) == -sinh(2)*I + + assert sin(pi) == 0 + assert sin(-pi) == 0 + assert sin(2*pi) == 0 + assert sin(-2*pi) == 0 + assert sin(-3*10**73*pi) == 0 + assert sin(7*10**103*pi) == 0 + + assert sin(pi/2) == 1 + assert sin(-pi/2) == -1 + assert sin(pi*Rational(5, 2)) == 1 + assert sin(pi*Rational(7, 2)) == -1 + + ne = symbols('ne', integer=True, even=False) + e = symbols('e', even=True) + assert sin(pi*ne/2) == (-1)**(ne/2 - S.Half) + assert sin(pi*k/2).func == sin + assert sin(pi*e/2) == 0 + assert sin(pi*k) == 0 + assert sin(pi*k).subs(k, 3) == sin(pi*k/2).subs(k, 6) # issue 8298 + + assert sin(pi/3) == S.Half*sqrt(3) + assert sin(pi*Rational(-2, 3)) == Rational(-1, 2)*sqrt(3) + + assert sin(pi/4) == S.Half*sqrt(2) + assert sin(-pi/4) == Rational(-1, 2)*sqrt(2) + assert sin(pi*Rational(17, 4)) == S.Half*sqrt(2) + assert sin(pi*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2) + + assert sin(pi/6) == S.Half + assert sin(-pi/6) == Rational(-1, 2) + assert sin(pi*Rational(7, 6)) == Rational(-1, 2) + assert sin(pi*Rational(-5, 6)) == Rational(-1, 2) + + assert sin(pi*Rational(1, 5)) == sqrt((5 - sqrt(5)) / 8) + assert sin(pi*Rational(2, 5)) == sqrt((5 + sqrt(5)) / 8) + assert sin(pi*Rational(3, 5)) == sin(pi*Rational(2, 5)) + assert sin(pi*Rational(4, 5)) == sin(pi*Rational(1, 5)) + assert sin(pi*Rational(6, 5)) == -sin(pi*Rational(1, 5)) + assert sin(pi*Rational(8, 5)) == -sin(pi*Rational(2, 5)) + + assert sin(pi*Rational(-1273, 5)) == -sin(pi*Rational(2, 5)) + + assert sin(pi/8) == sqrt((2 - sqrt(2))/4) + + assert sin(pi/10) == Rational(-1, 4) + sqrt(5)/4 + + assert sin(pi/12) == -sqrt(2)/4 + sqrt(6)/4 + assert sin(pi*Rational(5, 12)) == sqrt(2)/4 + sqrt(6)/4 + assert sin(pi*Rational(-7, 12)) == -sqrt(2)/4 - sqrt(6)/4 + assert sin(pi*Rational(-11, 12)) == sqrt(2)/4 - sqrt(6)/4 + + assert sin(pi*Rational(104, 105)) == sin(pi/105) + assert sin(pi*Rational(106, 105)) == -sin(pi/105) + + assert sin(pi*Rational(-104, 105)) == -sin(pi/105) + assert sin(pi*Rational(-106, 105)) == sin(pi/105) + + assert sin(x*I) == sinh(x)*I + + assert sin(k*pi) == 0 + assert sin(17*k*pi) == 0 + assert sin(2*k*pi + 4) == sin(4) + assert sin(2*k*pi + m*pi + 1) == (-1)**(m + 2*k)*sin(1) + + assert sin(k*pi*I) == sinh(k*pi)*I + + assert sin(r).is_real is True + + assert sin(0, evaluate=False).is_algebraic + assert sin(a).is_algebraic is None + assert sin(na).is_algebraic is False + q = Symbol('q', rational=True) + assert sin(pi*q).is_algebraic + qn = Symbol('qn', rational=True, nonzero=True) + assert sin(qn).is_rational is False + assert sin(q).is_rational is None # issue 8653 + + assert isinstance(sin( re(x) - im(y)), sin) is True + assert isinstance(sin(-re(x) + im(y)), sin) is False + + assert sin(SetExpr(Interval(0, 1))) == SetExpr(ImageSet(Lambda(x, sin(x)), + Interval(0, 1))) + + for d in list(range(1, 22)) + [60, 85]: + for n in range(d*2 + 1): + x = n*pi/d + e = abs( float(sin(x)) - sin(float(x)) ) + assert e < 1e-12 + + assert sin(0, evaluate=False).is_zero is True + assert sin(k*pi, evaluate=False).is_zero is True + + assert sin(Add(1, -1, evaluate=False), evaluate=False).is_zero is True + + +def test_sin_cos(): + for d in [1, 2, 3, 4, 5, 6, 10, 12, 15, 20, 24, 30, 40, 60, 120]: # list is not exhaustive... + for n in range(-2*d, d*2): + x = n*pi/d + assert sin(x + pi/2) == cos(x), "fails for %d*pi/%d" % (n, d) + assert sin(x - pi/2) == -cos(x), "fails for %d*pi/%d" % (n, d) + assert sin(x) == cos(x - pi/2), "fails for %d*pi/%d" % (n, d) + assert -sin(x) == cos(x + pi/2), "fails for %d*pi/%d" % (n, d) + + +def test_sin_series(): + assert sin(x).series(x, 0, 9) == \ + x - x**3/6 + x**5/120 - x**7/5040 + O(x**9) + + +def test_sin_rewrite(): + assert sin(x).rewrite(exp) == -I*(exp(I*x) - exp(-I*x))/2 + assert sin(x).rewrite(tan) == 2*tan(x/2)/(1 + tan(x/2)**2) + assert sin(x).rewrite(cot) == \ + Piecewise((0, Eq(im(x), 0) & Eq(Mod(x, pi), 0)), + (2*cot(x/2)/(cot(x/2)**2 + 1), True)) + assert sin(sinh(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, sinh(3)).n() + assert sin(cosh(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cosh(3)).n() + assert sin(tanh(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, tanh(3)).n() + assert sin(coth(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, coth(3)).n() + assert sin(sin(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, sin(3)).n() + assert sin(cos(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cos(3)).n() + assert sin(tan(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, tan(3)).n() + assert sin(cot(x)).rewrite( + exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cot(3)).n() + assert sin(log(x)).rewrite(Pow) == I*x**-I / 2 - I*x**I /2 + assert sin(x).rewrite(csc) == 1/csc(x) + assert sin(x).rewrite(cos) == cos(x - pi / 2, evaluate=False) + assert sin(x).rewrite(sec) == 1 / sec(x - pi / 2, evaluate=False) + assert sin(cos(x)).rewrite(Pow) == sin(cos(x)) + assert sin(x).rewrite(besselj) == sqrt(pi*x/2)*besselj(S.Half, x) + assert sin(x).rewrite(besselj).subs(x, 0) == sin(0) + + +def _test_extrig(f, i, e): + from sympy.core.function import expand_trig + assert unchanged(f, i) + assert expand_trig(f(i)) == f(i) + # testing directly instead of with .expand(trig=True) + # because the other expansions undo the unevaluated Mul + assert expand_trig(f(Mul(i, 1, evaluate=False))) == e + assert abs(f(i) - e).n() < 1e-10 + + +def test_sin_expansion(): + # Note: these formulas are not unique. The ones here come from the + # Chebyshev formulas. + assert sin(x + y).expand(trig=True) == sin(x)*cos(y) + cos(x)*sin(y) + assert sin(x - y).expand(trig=True) == sin(x)*cos(y) - cos(x)*sin(y) + assert sin(y - x).expand(trig=True) == cos(x)*sin(y) - sin(x)*cos(y) + assert sin(2*x).expand(trig=True) == 2*sin(x)*cos(x) + assert sin(3*x).expand(trig=True) == -4*sin(x)**3 + 3*sin(x) + assert sin(4*x).expand(trig=True) == -8*sin(x)**3*cos(x) + 4*sin(x)*cos(x) + assert sin(2*pi/17).expand(trig=True) == sin(2*pi/17, evaluate=False) + assert sin(x+pi/17).expand(trig=True) == sin(pi/17)*cos(x) + cos(pi/17)*sin(x) + _test_extrig(sin, 2, 2*sin(1)*cos(1)) + _test_extrig(sin, 3, -4*sin(1)**3 + 3*sin(1)) + + +def test_sin_AccumBounds(): + assert sin(AccumBounds(-oo, oo)) == AccumBounds(-1, 1) + assert sin(AccumBounds(0, oo)) == AccumBounds(-1, 1) + assert sin(AccumBounds(-oo, 0)) == AccumBounds(-1, 1) + assert sin(AccumBounds(0, 2*S.Pi)) == AccumBounds(-1, 1) + assert sin(AccumBounds(0, S.Pi*Rational(3, 4))) == AccumBounds(0, 1) + assert sin(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(7, 4))) == AccumBounds(-1, sin(S.Pi*Rational(3, 4))) + assert sin(AccumBounds(S.Pi/4, S.Pi/3)) == AccumBounds(sin(S.Pi/4), sin(S.Pi/3)) + assert sin(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(5, 6))) == AccumBounds(sin(S.Pi*Rational(5, 6)), sin(S.Pi*Rational(3, 4))) + + +def test_sin_fdiff(): + assert sin(x).fdiff() == cos(x) + raises(ArgumentIndexError, lambda: sin(x).fdiff(2)) + + +def test_trig_symmetry(): + assert sin(-x) == -sin(x) + assert cos(-x) == cos(x) + assert tan(-x) == -tan(x) + assert cot(-x) == -cot(x) + assert sin(x + pi) == -sin(x) + assert sin(x + 2*pi) == sin(x) + assert sin(x + 3*pi) == -sin(x) + assert sin(x + 4*pi) == sin(x) + assert sin(x - 5*pi) == -sin(x) + assert cos(x + pi) == -cos(x) + assert cos(x + 2*pi) == cos(x) + assert cos(x + 3*pi) == -cos(x) + assert cos(x + 4*pi) == cos(x) + assert cos(x - 5*pi) == -cos(x) + assert tan(x + pi) == tan(x) + assert tan(x - 3*pi) == tan(x) + assert cot(x + pi) == cot(x) + assert cot(x - 3*pi) == cot(x) + assert sin(pi/2 - x) == cos(x) + assert sin(pi*Rational(3, 2) - x) == -cos(x) + assert sin(pi*Rational(5, 2) - x) == cos(x) + assert cos(pi/2 - x) == sin(x) + assert cos(pi*Rational(3, 2) - x) == -sin(x) + assert cos(pi*Rational(5, 2) - x) == sin(x) + assert tan(pi/2 - x) == cot(x) + assert tan(pi*Rational(3, 2) - x) == cot(x) + assert tan(pi*Rational(5, 2) - x) == cot(x) + assert cot(pi/2 - x) == tan(x) + assert cot(pi*Rational(3, 2) - x) == tan(x) + assert cot(pi*Rational(5, 2) - x) == tan(x) + assert sin(pi/2 + x) == cos(x) + assert cos(pi/2 + x) == -sin(x) + assert tan(pi/2 + x) == -cot(x) + assert cot(pi/2 + x) == -tan(x) + + +def test_cos(): + x, y = symbols('x y') + + assert cos.nargs == FiniteSet(1) + assert cos(nan) is nan + + assert cos(oo) == AccumBounds(-1, 1) + assert cos(oo) - cos(oo) == AccumBounds(-2, 2) + assert cos(oo*I) is oo + assert cos(-oo*I) is oo + assert cos(zoo) is nan + + assert cos(0) == 1 + + assert cos(acos(x)) == x + assert cos(atan(x)) == 1 / sqrt(1 + x**2) + assert cos(asin(x)) == sqrt(1 - x**2) + assert cos(acot(x)) == 1 / sqrt(1 + 1 / x**2) + assert cos(acsc(x)) == sqrt(1 - 1 / x**2) + assert cos(asec(x)) == 1 / x + assert cos(atan2(y, x)) == x / sqrt(x**2 + y**2) + + assert cos(pi*I) == cosh(pi) + assert cos(-pi*I) == cosh(pi) + assert cos(-2*I) == cosh(2) + + assert cos(pi/2) == 0 + assert cos(-pi/2) == 0 + assert cos(pi/2) == 0 + assert cos(-pi/2) == 0 + assert cos((-3*10**73 + 1)*pi/2) == 0 + assert cos((7*10**103 + 1)*pi/2) == 0 + + n = symbols('n', integer=True, even=False) + e = symbols('e', even=True) + assert cos(pi*n/2) == 0 + assert cos(pi*e/2) == (-1)**(e/2) + + assert cos(pi) == -1 + assert cos(-pi) == -1 + assert cos(2*pi) == 1 + assert cos(5*pi) == -1 + assert cos(8*pi) == 1 + + assert cos(pi/3) == S.Half + assert cos(pi*Rational(-2, 3)) == Rational(-1, 2) + + assert cos(pi/4) == S.Half*sqrt(2) + assert cos(-pi/4) == S.Half*sqrt(2) + assert cos(pi*Rational(11, 4)) == Rational(-1, 2)*sqrt(2) + assert cos(pi*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2) + + assert cos(pi/6) == S.Half*sqrt(3) + assert cos(-pi/6) == S.Half*sqrt(3) + assert cos(pi*Rational(7, 6)) == Rational(-1, 2)*sqrt(3) + assert cos(pi*Rational(-5, 6)) == Rational(-1, 2)*sqrt(3) + + assert cos(pi*Rational(1, 5)) == (sqrt(5) + 1)/4 + assert cos(pi*Rational(2, 5)) == (sqrt(5) - 1)/4 + assert cos(pi*Rational(3, 5)) == -cos(pi*Rational(2, 5)) + assert cos(pi*Rational(4, 5)) == -cos(pi*Rational(1, 5)) + assert cos(pi*Rational(6, 5)) == -cos(pi*Rational(1, 5)) + assert cos(pi*Rational(8, 5)) == cos(pi*Rational(2, 5)) + + assert cos(pi*Rational(-1273, 5)) == -cos(pi*Rational(2, 5)) + + assert cos(pi/8) == sqrt((2 + sqrt(2))/4) + + assert cos(pi/12) == sqrt(2)/4 + sqrt(6)/4 + assert cos(pi*Rational(5, 12)) == -sqrt(2)/4 + sqrt(6)/4 + assert cos(pi*Rational(7, 12)) == sqrt(2)/4 - sqrt(6)/4 + assert cos(pi*Rational(11, 12)) == -sqrt(2)/4 - sqrt(6)/4 + + assert cos(pi*Rational(104, 105)) == -cos(pi/105) + assert cos(pi*Rational(106, 105)) == -cos(pi/105) + + assert cos(pi*Rational(-104, 105)) == -cos(pi/105) + assert cos(pi*Rational(-106, 105)) == -cos(pi/105) + + assert cos(x*I) == cosh(x) + assert cos(k*pi*I) == cosh(k*pi) + + assert cos(r).is_real is True + + assert cos(0, evaluate=False).is_algebraic + assert cos(a).is_algebraic is None + assert cos(na).is_algebraic is False + q = Symbol('q', rational=True) + assert cos(pi*q).is_algebraic + assert cos(pi*Rational(2, 7)).is_algebraic + + assert cos(k*pi) == (-1)**k + assert cos(2*k*pi) == 1 + assert cos(0, evaluate=False).is_zero is False + assert cos(Rational(1, 2)).is_zero is False + # The following test will return None as the result, but really it should + # be True even if it is not always possible to resolve an assumptions query. + assert cos(asin(-1, evaluate=False), evaluate=False).is_zero is None + for d in list(range(1, 22)) + [60, 85]: + for n in range(2*d + 1): + x = n*pi/d + e = abs( float(cos(x)) - cos(float(x)) ) + assert e < 1e-12 + + +def test_issue_6190(): + c = Float('123456789012345678901234567890.25', '') + for cls in [sin, cos, tan, cot]: + assert cls(c*pi) == cls(pi/4) + assert cls(4.125*pi) == cls(pi/8) + assert cls(4.7*pi) == cls((4.7 % 2)*pi) + + +def test_cos_series(): + assert cos(x).series(x, 0, 9) == \ + 1 - x**2/2 + x**4/24 - x**6/720 + x**8/40320 + O(x**9) + + +def test_cos_rewrite(): + assert cos(x).rewrite(exp) == exp(I*x)/2 + exp(-I*x)/2 + assert cos(x).rewrite(tan) == (1 - tan(x/2)**2)/(1 + tan(x/2)**2) + assert cos(x).rewrite(cot) == \ + Piecewise((1, Eq(im(x), 0) & Eq(Mod(x, 2*pi), 0)), + ((cot(x/2)**2 - 1)/(cot(x/2)**2 + 1), True)) + assert cos(sinh(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, sinh(3)).n() + assert cos(cosh(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cosh(3)).n() + assert cos(tanh(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, tanh(3)).n() + assert cos(coth(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, coth(3)).n() + assert cos(sin(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, sin(3)).n() + assert cos(cos(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cos(3)).n() + assert cos(tan(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, tan(3)).n() + assert cos(cot(x)).rewrite( + exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cot(3)).n() + assert cos(log(x)).rewrite(Pow) == x**I/2 + x**-I/2 + assert cos(x).rewrite(sec) == 1/sec(x) + assert cos(x).rewrite(sin) == sin(x + pi/2, evaluate=False) + assert cos(x).rewrite(csc) == 1/csc(-x + pi/2, evaluate=False) + assert cos(sin(x)).rewrite(Pow) == cos(sin(x)) + assert cos(x).rewrite(besselj) == Piecewise( + (sqrt(pi*x/2)*besselj(-S.Half, x), Ne(x, 0)), + (1, True) + ) + assert cos(x).rewrite(besselj).subs(x, 0) == cos(0) + + +def test_cos_expansion(): + assert cos(x + y).expand(trig=True) == cos(x)*cos(y) - sin(x)*sin(y) + assert cos(x - y).expand(trig=True) == cos(x)*cos(y) + sin(x)*sin(y) + assert cos(y - x).expand(trig=True) == cos(x)*cos(y) + sin(x)*sin(y) + assert cos(2*x).expand(trig=True) == 2*cos(x)**2 - 1 + assert cos(3*x).expand(trig=True) == 4*cos(x)**3 - 3*cos(x) + assert cos(4*x).expand(trig=True) == 8*cos(x)**4 - 8*cos(x)**2 + 1 + assert cos(2*pi/17).expand(trig=True) == cos(2*pi/17, evaluate=False) + assert cos(x+pi/17).expand(trig=True) == cos(pi/17)*cos(x) - sin(pi/17)*sin(x) + _test_extrig(cos, 2, 2*cos(1)**2 - 1) + _test_extrig(cos, 3, 4*cos(1)**3 - 3*cos(1)) + + +def test_cos_AccumBounds(): + assert cos(AccumBounds(-oo, oo)) == AccumBounds(-1, 1) + assert cos(AccumBounds(0, oo)) == AccumBounds(-1, 1) + assert cos(AccumBounds(-oo, 0)) == AccumBounds(-1, 1) + assert cos(AccumBounds(0, 2*S.Pi)) == AccumBounds(-1, 1) + assert cos(AccumBounds(-S.Pi/3, S.Pi/4)) == AccumBounds(cos(-S.Pi/3), 1) + assert cos(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(5, 4))) == AccumBounds(-1, cos(S.Pi*Rational(3, 4))) + assert cos(AccumBounds(S.Pi*Rational(5, 4), S.Pi*Rational(4, 3))) == AccumBounds(cos(S.Pi*Rational(5, 4)), cos(S.Pi*Rational(4, 3))) + assert cos(AccumBounds(S.Pi/4, S.Pi/3)) == AccumBounds(cos(S.Pi/3), cos(S.Pi/4)) + + +def test_cos_fdiff(): + assert cos(x).fdiff() == -sin(x) + raises(ArgumentIndexError, lambda: cos(x).fdiff(2)) + + +def test_tan(): + assert tan(nan) is nan + + assert tan(zoo) is nan + assert tan(oo) == AccumBounds(-oo, oo) + assert tan(oo) - tan(oo) == AccumBounds(-oo, oo) + assert tan.nargs == FiniteSet(1) + assert tan(oo*I) == I + assert tan(-oo*I) == -I + + assert tan(0) == 0 + + assert tan(atan(x)) == x + assert tan(asin(x)) == x / sqrt(1 - x**2) + assert tan(acos(x)) == sqrt(1 - x**2) / x + assert tan(acot(x)) == 1 / x + assert tan(acsc(x)) == 1 / (sqrt(1 - 1 / x**2) * x) + assert tan(asec(x)) == sqrt(1 - 1 / x**2) * x + assert tan(atan2(y, x)) == y/x + + assert tan(pi*I) == tanh(pi)*I + assert tan(-pi*I) == -tanh(pi)*I + assert tan(-2*I) == -tanh(2)*I + + assert tan(pi) == 0 + assert tan(-pi) == 0 + assert tan(2*pi) == 0 + assert tan(-2*pi) == 0 + assert tan(-3*10**73*pi) == 0 + + assert tan(pi/2) is zoo + assert tan(pi*Rational(3, 2)) is zoo + + assert tan(pi/3) == sqrt(3) + assert tan(pi*Rational(-2, 3)) == sqrt(3) + + assert tan(pi/4) is S.One + assert tan(-pi/4) is S.NegativeOne + assert tan(pi*Rational(17, 4)) is S.One + assert tan(pi*Rational(-3, 4)) is S.One + + assert tan(pi/5) == sqrt(5 - 2*sqrt(5)) + assert tan(pi*Rational(2, 5)) == sqrt(5 + 2*sqrt(5)) + assert tan(pi*Rational(18, 5)) == -sqrt(5 + 2*sqrt(5)) + assert tan(pi*Rational(-16, 5)) == -sqrt(5 - 2*sqrt(5)) + + assert tan(pi/6) == 1/sqrt(3) + assert tan(-pi/6) == -1/sqrt(3) + assert tan(pi*Rational(7, 6)) == 1/sqrt(3) + assert tan(pi*Rational(-5, 6)) == 1/sqrt(3) + + assert tan(pi/8) == -1 + sqrt(2) + assert tan(pi*Rational(3, 8)) == 1 + sqrt(2) # issue 15959 + assert tan(pi*Rational(5, 8)) == -1 - sqrt(2) + assert tan(pi*Rational(7, 8)) == 1 - sqrt(2) + + assert tan(pi/10) == sqrt(1 - 2*sqrt(5)/5) + assert tan(pi*Rational(3, 10)) == sqrt(1 + 2*sqrt(5)/5) + assert tan(pi*Rational(17, 10)) == -sqrt(1 + 2*sqrt(5)/5) + assert tan(pi*Rational(-31, 10)) == -sqrt(1 - 2*sqrt(5)/5) + + assert tan(pi/12) == -sqrt(3) + 2 + assert tan(pi*Rational(5, 12)) == sqrt(3) + 2 + assert tan(pi*Rational(7, 12)) == -sqrt(3) - 2 + assert tan(pi*Rational(11, 12)) == sqrt(3) - 2 + + assert tan(pi/24).radsimp() == -2 - sqrt(3) + sqrt(2) + sqrt(6) + assert tan(pi*Rational(5, 24)).radsimp() == -2 + sqrt(3) - sqrt(2) + sqrt(6) + assert tan(pi*Rational(7, 24)).radsimp() == 2 - sqrt(3) - sqrt(2) + sqrt(6) + assert tan(pi*Rational(11, 24)).radsimp() == 2 + sqrt(3) + sqrt(2) + sqrt(6) + assert tan(pi*Rational(13, 24)).radsimp() == -2 - sqrt(3) - sqrt(2) - sqrt(6) + assert tan(pi*Rational(17, 24)).radsimp() == -2 + sqrt(3) + sqrt(2) - sqrt(6) + assert tan(pi*Rational(19, 24)).radsimp() == 2 - sqrt(3) + sqrt(2) - sqrt(6) + assert tan(pi*Rational(23, 24)).radsimp() == 2 + sqrt(3) - sqrt(2) - sqrt(6) + + assert tan(x*I) == tanh(x)*I + + assert tan(k*pi) == 0 + assert tan(17*k*pi) == 0 + + assert tan(k*pi*I) == tanh(k*pi)*I + + assert tan(r).is_real is None + assert tan(r).is_extended_real is True + + assert tan(0, evaluate=False).is_algebraic + assert tan(a).is_algebraic is None + assert tan(na).is_algebraic is False + + assert tan(pi*Rational(10, 7)) == tan(pi*Rational(3, 7)) + assert tan(pi*Rational(11, 7)) == -tan(pi*Rational(3, 7)) + assert tan(pi*Rational(-11, 7)) == tan(pi*Rational(3, 7)) + + assert tan(pi*Rational(15, 14)) == tan(pi/14) + assert tan(pi*Rational(-15, 14)) == -tan(pi/14) + + assert tan(r).is_finite is None + assert tan(I*r).is_finite is True + + # https://github.com/sympy/sympy/issues/21177 + f = tan(pi*(x + S(3)/2))/(3*x) + assert f.as_leading_term(x) == -1/(3*pi*x**2) + + +def test_tan_series(): + assert tan(x).series(x, 0, 9) == \ + x + x**3/3 + 2*x**5/15 + 17*x**7/315 + O(x**9) + + +def test_tan_rewrite(): + neg_exp, pos_exp = exp(-x*I), exp(x*I) + assert tan(x).rewrite(exp) == I*(neg_exp - pos_exp)/(neg_exp + pos_exp) + assert tan(x).rewrite(sin) == 2*sin(x)**2/sin(2*x) + assert tan(x).rewrite(cos) == cos(x - S.Pi/2, evaluate=False)/cos(x) + assert tan(x).rewrite(cot) == 1/cot(x) + assert tan(sinh(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, sinh(3)).n() + assert tan(cosh(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cosh(3)).n() + assert tan(tanh(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, tanh(3)).n() + assert tan(coth(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, coth(3)).n() + assert tan(sin(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, sin(3)).n() + assert tan(cos(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cos(3)).n() + assert tan(tan(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, tan(3)).n() + assert tan(cot(x)).rewrite(exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cot(3)).n() + assert tan(log(x)).rewrite(Pow) == I*(x**-I - x**I)/(x**-I + x**I) + assert tan(x).rewrite(sec) == sec(x)/sec(x - pi/2, evaluate=False) + assert tan(x).rewrite(csc) == csc(-x + pi/2, evaluate=False)/csc(x) + assert tan(sin(x)).rewrite(Pow) == tan(sin(x)) + assert tan(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == sqrt(sqrt(5)/8 + + Rational(5, 8))/(Rational(-1, 4) + sqrt(5)/4) + assert tan(x).rewrite(besselj) == besselj(S.Half, x)/besselj(-S.Half, x) + assert tan(x).rewrite(besselj).subs(x, 0) == tan(0) + + +@slow +def test_tan_rewrite_slow(): + assert 0 == (cos(pi/34)*tan(pi/34) - sin(pi/34)).rewrite(pow) + assert 0 == (cos(pi/17)*tan(pi/17) - sin(pi/17)).rewrite(pow) + assert tan(pi/19).rewrite(pow) == tan(pi/19) + assert tan(pi*Rational(8, 19)).rewrite(sqrt) == tan(pi*Rational(8, 19)) + assert tan(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == sqrt(sqrt(5)/8 + + Rational(5, 8))/(Rational(-1, 4) + sqrt(5)/4) + + +def test_tan_subs(): + assert tan(x).subs(tan(x), y) == y + assert tan(x).subs(x, y) == tan(y) + assert tan(x).subs(x, S.Pi/2) is zoo + assert tan(x).subs(x, S.Pi*Rational(3, 2)) is zoo + + +def test_tan_expansion(): + assert tan(x + y).expand(trig=True) == ((tan(x) + tan(y))/(1 - tan(x)*tan(y))).expand() + assert tan(x - y).expand(trig=True) == ((tan(x) - tan(y))/(1 + tan(x)*tan(y))).expand() + assert tan(x + y + z).expand(trig=True) == ( + (tan(x) + tan(y) + tan(z) - tan(x)*tan(y)*tan(z))/ + (1 - tan(x)*tan(y) - tan(x)*tan(z) - tan(y)*tan(z))).expand() + assert 0 == tan(2*x).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 7))])*24 - 7 + assert 0 == tan(3*x).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 5))])*55 - 37 + assert 0 == tan(4*x - pi/4).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 5))])*239 - 1 + _test_extrig(tan, 2, 2*tan(1)/(1 - tan(1)**2)) + _test_extrig(tan, 3, (-tan(1)**3 + 3*tan(1))/(1 - 3*tan(1)**2)) + + +def test_tan_AccumBounds(): + assert tan(AccumBounds(-oo, oo)) == AccumBounds(-oo, oo) + assert tan(AccumBounds(S.Pi/3, S.Pi*Rational(2, 3))) == AccumBounds(-oo, oo) + assert tan(AccumBounds(S.Pi/6, S.Pi/3)) == AccumBounds(tan(S.Pi/6), tan(S.Pi/3)) + + +def test_tan_fdiff(): + assert tan(x).fdiff() == tan(x)**2 + 1 + raises(ArgumentIndexError, lambda: tan(x).fdiff(2)) + + +def test_cot(): + assert cot(nan) is nan + + assert cot.nargs == FiniteSet(1) + assert cot(oo*I) == -I + assert cot(-oo*I) == I + assert cot(zoo) is nan + + assert cot(0) is zoo + assert cot(2*pi) is zoo + + assert cot(acot(x)) == x + assert cot(atan(x)) == 1 / x + assert cot(asin(x)) == sqrt(1 - x**2) / x + assert cot(acos(x)) == x / sqrt(1 - x**2) + assert cot(acsc(x)) == sqrt(1 - 1 / x**2) * x + assert cot(asec(x)) == 1 / (sqrt(1 - 1 / x**2) * x) + assert cot(atan2(y, x)) == x/y + + assert cot(pi*I) == -coth(pi)*I + assert cot(-pi*I) == coth(pi)*I + assert cot(-2*I) == coth(2)*I + + assert cot(pi) == cot(2*pi) == cot(3*pi) + assert cot(-pi) == cot(-2*pi) == cot(-3*pi) + + assert cot(pi/2) == 0 + assert cot(-pi/2) == 0 + assert cot(pi*Rational(5, 2)) == 0 + assert cot(pi*Rational(7, 2)) == 0 + + assert cot(pi/3) == 1/sqrt(3) + assert cot(pi*Rational(-2, 3)) == 1/sqrt(3) + + assert cot(pi/4) is S.One + assert cot(-pi/4) is S.NegativeOne + assert cot(pi*Rational(17, 4)) is S.One + assert cot(pi*Rational(-3, 4)) is S.One + + assert cot(pi/6) == sqrt(3) + assert cot(-pi/6) == -sqrt(3) + assert cot(pi*Rational(7, 6)) == sqrt(3) + assert cot(pi*Rational(-5, 6)) == sqrt(3) + + assert cot(pi/8) == 1 + sqrt(2) + assert cot(pi*Rational(3, 8)) == -1 + sqrt(2) + assert cot(pi*Rational(5, 8)) == 1 - sqrt(2) + assert cot(pi*Rational(7, 8)) == -1 - sqrt(2) + + assert cot(pi/12) == sqrt(3) + 2 + assert cot(pi*Rational(5, 12)) == -sqrt(3) + 2 + assert cot(pi*Rational(7, 12)) == sqrt(3) - 2 + assert cot(pi*Rational(11, 12)) == -sqrt(3) - 2 + + assert cot(pi/24).radsimp() == sqrt(2) + sqrt(3) + 2 + sqrt(6) + assert cot(pi*Rational(5, 24)).radsimp() == -sqrt(2) - sqrt(3) + 2 + sqrt(6) + assert cot(pi*Rational(7, 24)).radsimp() == -sqrt(2) + sqrt(3) - 2 + sqrt(6) + assert cot(pi*Rational(11, 24)).radsimp() == sqrt(2) - sqrt(3) - 2 + sqrt(6) + assert cot(pi*Rational(13, 24)).radsimp() == -sqrt(2) + sqrt(3) + 2 - sqrt(6) + assert cot(pi*Rational(17, 24)).radsimp() == sqrt(2) - sqrt(3) + 2 - sqrt(6) + assert cot(pi*Rational(19, 24)).radsimp() == sqrt(2) + sqrt(3) - 2 - sqrt(6) + assert cot(pi*Rational(23, 24)).radsimp() == -sqrt(2) - sqrt(3) - 2 - sqrt(6) + + assert cot(x*I) == -coth(x)*I + assert cot(k*pi*I) == -coth(k*pi)*I + + assert cot(r).is_real is None + assert cot(r).is_extended_real is True + + assert cot(a).is_algebraic is None + assert cot(na).is_algebraic is False + + assert cot(pi*Rational(10, 7)) == cot(pi*Rational(3, 7)) + assert cot(pi*Rational(11, 7)) == -cot(pi*Rational(3, 7)) + assert cot(pi*Rational(-11, 7)) == cot(pi*Rational(3, 7)) + + assert cot(pi*Rational(39, 34)) == cot(pi*Rational(5, 34)) + assert cot(pi*Rational(-41, 34)) == -cot(pi*Rational(7, 34)) + + assert cot(x).is_finite is None + assert cot(r).is_finite is None + i = Symbol('i', imaginary=True) + assert cot(i).is_finite is True + + assert cot(x).subs(x, 3*pi) is zoo + + # https://github.com/sympy/sympy/issues/21177 + f = cot(pi*(x + 4))/(3*x) + assert f.as_leading_term(x) == 1/(3*pi*x**2) + + +def test_tan_cot_sin_cos_evalf(): + assert abs((tan(pi*Rational(8, 15))*cos(pi*Rational(8, 15))/sin(pi*Rational(8, 15)) - 1).evalf()) < 1e-14 + assert abs((cot(pi*Rational(4, 15))*sin(pi*Rational(4, 15))/cos(pi*Rational(4, 15)) - 1).evalf()) < 1e-14 + +@XFAIL +def test_tan_cot_sin_cos_ratsimp(): + assert 1 == (tan(pi*Rational(8, 15))*cos(pi*Rational(8, 15))/sin(pi*Rational(8, 15))).ratsimp() + assert 1 == (cot(pi*Rational(4, 15))*sin(pi*Rational(4, 15))/cos(pi*Rational(4, 15))).ratsimp() + + +def test_cot_series(): + assert cot(x).series(x, 0, 9) == \ + 1/x - x/3 - x**3/45 - 2*x**5/945 - x**7/4725 + O(x**9) + # issue 6210 + assert cot(x**4 + x**5).series(x, 0, 1) == \ + x**(-4) - 1/x**3 + x**(-2) - 1/x + 1 + O(x) + assert cot(pi*(1-x)).series(x, 0, 3) == -1/(pi*x) + pi*x/3 + O(x**3) + assert cot(x).taylor_term(0, x) == 1/x + assert cot(x).taylor_term(2, x) is S.Zero + assert cot(x).taylor_term(3, x) == -x**3/45 + + +def test_cot_rewrite(): + neg_exp, pos_exp = exp(-x*I), exp(x*I) + assert cot(x).rewrite(exp) == I*(pos_exp + neg_exp)/(pos_exp - neg_exp) + assert cot(x).rewrite(sin) == sin(2*x)/(2*(sin(x)**2)) + assert cot(x).rewrite(cos) == cos(x)/cos(x - pi/2, evaluate=False) + assert cot(x).rewrite(tan) == 1/tan(x) + def check(func): + z = cot(func(x)).rewrite(exp) - cot(x).rewrite(exp).subs(x, func(x)) + assert z.rewrite(exp).expand() == 0 + check(sinh) + check(cosh) + check(tanh) + check(coth) + check(sin) + check(cos) + check(tan) + assert cot(log(x)).rewrite(Pow) == -I*(x**-I + x**I)/(x**-I - x**I) + assert cot(x).rewrite(sec) == sec(x - pi / 2, evaluate=False) / sec(x) + assert cot(x).rewrite(csc) == csc(x) / csc(- x + pi / 2, evaluate=False) + assert cot(sin(x)).rewrite(Pow) == cot(sin(x)) + assert cot(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == (Rational(-1, 4) + sqrt(5)/4)/\ + sqrt(sqrt(5)/8 + Rational(5, 8)) + assert cot(x).rewrite(besselj) == besselj(-S.Half, x)/besselj(S.Half, x) + assert cot(x).rewrite(besselj).subs(x, 0) == cot(0) + + +@slow +def test_cot_rewrite_slow(): + assert cot(pi*Rational(4, 34)).rewrite(pow).ratsimp() == \ + (cos(pi*Rational(4, 34))/sin(pi*Rational(4, 34))).rewrite(pow).ratsimp() + assert cot(pi*Rational(4, 17)).rewrite(pow) == \ + (cos(pi*Rational(4, 17))/sin(pi*Rational(4, 17))).rewrite(pow) + assert cot(pi/19).rewrite(pow) == cot(pi/19) + assert cot(pi/19).rewrite(sqrt) == cot(pi/19) + assert cot(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == \ + (Rational(-1, 4) + sqrt(5)/4) / sqrt(sqrt(5)/8 + Rational(5, 8)) + + +def test_cot_subs(): + assert cot(x).subs(cot(x), y) == y + assert cot(x).subs(x, y) == cot(y) + assert cot(x).subs(x, 0) is zoo + assert cot(x).subs(x, S.Pi) is zoo + + +def test_cot_expansion(): + assert cot(x + y).expand(trig=True).together() == ( + (cot(x)*cot(y) - 1)/(cot(x) + cot(y))) + assert cot(x - y).expand(trig=True).together() == ( + cot(x)*cot(-y) - 1)/(cot(x) + cot(-y)) + assert cot(x + y + z).expand(trig=True).together() == ( + (cot(x)*cot(y)*cot(z) - cot(x) - cot(y) - cot(z))/ + (-1 + cot(x)*cot(y) + cot(x)*cot(z) + cot(y)*cot(z))) + assert cot(3*x).expand(trig=True).together() == ( + (cot(x)**2 - 3)*cot(x)/(3*cot(x)**2 - 1)) + assert cot(2*x).expand(trig=True) == cot(x)/2 - 1/(2*cot(x)) + assert cot(3*x).expand(trig=True).together() == ( + cot(x)**2 - 3)*cot(x)/(3*cot(x)**2 - 1) + assert cot(4*x - pi/4).expand(trig=True).cancel() == ( + -tan(x)**4 + 4*tan(x)**3 + 6*tan(x)**2 - 4*tan(x) - 1 + )/(tan(x)**4 + 4*tan(x)**3 - 6*tan(x)**2 - 4*tan(x) + 1) + _test_extrig(cot, 2, (-1 + cot(1)**2)/(2*cot(1))) + _test_extrig(cot, 3, (-3*cot(1) + cot(1)**3)/(-1 + 3*cot(1)**2)) + + +def test_cot_AccumBounds(): + assert cot(AccumBounds(-oo, oo)) == AccumBounds(-oo, oo) + assert cot(AccumBounds(-S.Pi/3, S.Pi/3)) == AccumBounds(-oo, oo) + assert cot(AccumBounds(S.Pi/6, S.Pi/3)) == AccumBounds(cot(S.Pi/3), cot(S.Pi/6)) + + +def test_cot_fdiff(): + assert cot(x).fdiff() == -cot(x)**2 - 1 + raises(ArgumentIndexError, lambda: cot(x).fdiff(2)) + + +def test_sinc(): + assert isinstance(sinc(x), sinc) + + s = Symbol('s', zero=True) + assert sinc(s) is S.One + assert sinc(S.Infinity) is S.Zero + assert sinc(S.NegativeInfinity) is S.Zero + assert sinc(S.NaN) is S.NaN + assert sinc(S.ComplexInfinity) is S.NaN + + n = Symbol('n', integer=True, nonzero=True) + assert sinc(n*pi) is S.Zero + assert sinc(-n*pi) is S.Zero + assert sinc(pi/2) == 2 / pi + assert sinc(-pi/2) == 2 / pi + assert sinc(pi*Rational(5, 2)) == 2 / (5*pi) + assert sinc(pi*Rational(7, 2)) == -2 / (7*pi) + + assert sinc(-x) == sinc(x) + + assert sinc(x).diff(x) == cos(x)/x - sin(x)/x**2 + assert sinc(x).diff(x) == (sin(x)/x).diff(x) + assert sinc(x).diff(x, x) == (-sin(x) - 2*cos(x)/x + 2*sin(x)/x**2)/x + assert sinc(x).diff(x, x) == (sin(x)/x).diff(x, x) + assert limit(sinc(x).diff(x), x, 0) == 0 + assert limit(sinc(x).diff(x, x), x, 0) == -S(1)/3 + + # https://github.com/sympy/sympy/issues/11402 + # + # assert sinc(x).diff(x) == Piecewise(((x*cos(x) - sin(x)) / x**2, Ne(x, 0)), (0, True)) + # + # assert sinc(x).diff(x).equals(sinc(x).rewrite(sin).diff(x)) + # + # assert sinc(x).diff(x).subs(x, 0) is S.Zero + + assert sinc(x).series() == 1 - x**2/6 + x**4/120 + O(x**6) + + assert sinc(x).rewrite(jn) == jn(0, x) + assert sinc(x).rewrite(sin) == Piecewise((sin(x)/x, Ne(x, 0)), (1, True)) + assert sinc(pi, evaluate=False).is_zero is True + assert sinc(0, evaluate=False).is_zero is False + assert sinc(n*pi, evaluate=False).is_zero is True + assert sinc(x).is_zero is None + xr = Symbol('xr', real=True, nonzero=True) + assert sinc(x).is_real is None + assert sinc(xr).is_real is True + assert sinc(I*xr).is_real is True + assert sinc(I*100).is_real is True + assert sinc(x).is_finite is None + assert sinc(xr).is_finite is True + + +def test_asin(): + assert asin(nan) is nan + + assert asin.nargs == FiniteSet(1) + assert asin(oo) == -I*oo + assert asin(-oo) == I*oo + assert asin(zoo) is zoo + + # Note: asin(-x) = - asin(x) + assert asin(0) == 0 + assert asin(1) == pi/2 + assert asin(-1) == -pi/2 + assert asin(sqrt(3)/2) == pi/3 + assert asin(-sqrt(3)/2) == -pi/3 + assert asin(sqrt(2)/2) == pi/4 + assert asin(-sqrt(2)/2) == -pi/4 + assert asin(sqrt((5 - sqrt(5))/8)) == pi/5 + assert asin(-sqrt((5 - sqrt(5))/8)) == -pi/5 + assert asin(S.Half) == pi/6 + assert asin(Rational(-1, 2)) == -pi/6 + assert asin((sqrt(2 - sqrt(2)))/2) == pi/8 + assert asin(-(sqrt(2 - sqrt(2)))/2) == -pi/8 + assert asin((sqrt(5) - 1)/4) == pi/10 + assert asin(-(sqrt(5) - 1)/4) == -pi/10 + assert asin((sqrt(3) - 1)/sqrt(2**3)) == pi/12 + assert asin(-(sqrt(3) - 1)/sqrt(2**3)) == -pi/12 + + # check round-trip for exact values: + for d in [5, 6, 8, 10, 12]: + for n in range(-(d//2), d//2 + 1): + if gcd(n, d) == 1: + assert asin(sin(n*pi/d)) == n*pi/d + + assert asin(x).diff(x) == 1/sqrt(1 - x**2) + + assert asin(0.2, evaluate=False).is_real is True + assert asin(-2).is_real is False + assert asin(r).is_real is None + + assert asin(-2*I) == -I*asinh(2) + + assert asin(Rational(1, 7), evaluate=False).is_positive is True + assert asin(Rational(-1, 7), evaluate=False).is_positive is False + assert asin(p).is_positive is None + assert asin(sin(Rational(7, 2))) == Rational(-7, 2) + pi + assert asin(sin(Rational(-7, 4))) == Rational(7, 4) - pi + assert unchanged(asin, cos(x)) + + +def test_asin_series(): + assert asin(x).series(x, 0, 9) == \ + x + x**3/6 + 3*x**5/40 + 5*x**7/112 + O(x**9) + t5 = asin(x).taylor_term(5, x) + assert t5 == 3*x**5/40 + assert asin(x).taylor_term(7, x, t5, 0) == 5*x**7/112 + + +def test_asin_leading_term(): + assert asin(x).as_leading_term(x) == x + # Tests concerning branch points + assert asin(x + 1).as_leading_term(x) == pi/2 + assert asin(x - 1).as_leading_term(x) == -pi/2 + assert asin(1/x).as_leading_term(x, cdir=1) == I*log(x) + pi/2 - I*log(2) + assert asin(1/x).as_leading_term(x, cdir=-1) == -I*log(x) - 3*pi/2 + I*log(2) + # Tests concerning points lying on branch cuts + assert asin(I*x + 2).as_leading_term(x, cdir=1) == pi - asin(2) + assert asin(-I*x + 2).as_leading_term(x, cdir=1) == asin(2) + assert asin(I*x - 2).as_leading_term(x, cdir=1) == -asin(2) + assert asin(-I*x - 2).as_leading_term(x, cdir=1) == -pi + asin(2) + # Tests concerning im(ndir) == 0 + assert asin(-I*x**2 + x - 2).as_leading_term(x, cdir=1) == -pi/2 + I*log(2 - sqrt(3)) + assert asin(-I*x**2 + x - 2).as_leading_term(x, cdir=-1) == -pi/2 + I*log(2 - sqrt(3)) + + +def test_asin_rewrite(): + assert asin(x).rewrite(log) == -I*log(I*x + sqrt(1 - x**2)) + assert asin(x).rewrite(atan) == 2*atan(x/(1 + sqrt(1 - x**2))) + assert asin(x).rewrite(acos) == S.Pi/2 - acos(x) + assert asin(x).rewrite(acot) == 2*acot((sqrt(-x**2 + 1) + 1)/x) + assert asin(x).rewrite(asec) == -asec(1/x) + pi/2 + assert asin(x).rewrite(acsc) == acsc(1/x) + + +def test_asin_fdiff(): + assert asin(x).fdiff() == 1/sqrt(1 - x**2) + raises(ArgumentIndexError, lambda: asin(x).fdiff(2)) + + +def test_acos(): + assert acos(nan) is nan + assert acos(zoo) is zoo + + assert acos.nargs == FiniteSet(1) + assert acos(oo) == I*oo + assert acos(-oo) == -I*oo + + # Note: acos(-x) = pi - acos(x) + assert acos(0) == pi/2 + assert acos(S.Half) == pi/3 + assert acos(Rational(-1, 2)) == pi*Rational(2, 3) + assert acos(1) == 0 + assert acos(-1) == pi + assert acos(sqrt(2)/2) == pi/4 + assert acos(-sqrt(2)/2) == pi*Rational(3, 4) + + # check round-trip for exact values: + for d in range(5, 13): + for num in range(d): + if gcd(num, d) == 1: + assert acos(cos(num*pi/d)) == num*pi/d + assert acos(-cos(num*pi/d)) == pi - num*pi/d + assert acos(sin(num*pi/d)) == pi/2 - asin(sin(num*pi/d)) + assert acos(-sin(num*pi/d)) == pi/2 - asin(-sin(num*pi/d)) + + assert acos(2*I) == pi/2 - asin(2*I) + + assert acos(x).diff(x) == -1/sqrt(1 - x**2) + + assert acos(0.2).is_real is True + assert acos(-2).is_real is False + assert acos(r).is_real is None + + assert acos(Rational(1, 7), evaluate=False).is_positive is True + assert acos(Rational(-1, 7), evaluate=False).is_positive is True + assert acos(Rational(3, 2), evaluate=False).is_positive is False + assert acos(p).is_positive is None + + assert acos(2 + p).conjugate() != acos(10 + p) + assert acos(-3 + n).conjugate() != acos(-3 + n) + assert acos(Rational(1, 3)).conjugate() == acos(Rational(1, 3)) + assert acos(Rational(-1, 3)).conjugate() == acos(Rational(-1, 3)) + assert acos(p + n*I).conjugate() == acos(p - n*I) + assert acos(z).conjugate() != acos(conjugate(z)) + + +def test_acos_leading_term(): + assert acos(x).as_leading_term(x) == pi/2 + # Tests concerning branch points + assert acos(x + 1).as_leading_term(x) == sqrt(2)*sqrt(-x) + assert acos(x - 1).as_leading_term(x) == pi + assert acos(1/x).as_leading_term(x, cdir=1) == -I*log(x) + I*log(2) + assert acos(1/x).as_leading_term(x, cdir=-1) == I*log(x) + 2*pi - I*log(2) + # Tests concerning points lying on branch cuts + assert acos(I*x + 2).as_leading_term(x, cdir=1) == -acos(2) + assert acos(-I*x + 2).as_leading_term(x, cdir=1) == acos(2) + assert acos(I*x - 2).as_leading_term(x, cdir=1) == acos(-2) + assert acos(-I*x - 2).as_leading_term(x, cdir=1) == 2*pi - acos(-2) + # Tests concerning im(ndir) == 0 + assert acos(-I*x**2 + x - 2).as_leading_term(x, cdir=1) == pi + I*log(sqrt(3) + 2) + assert acos(-I*x**2 + x - 2).as_leading_term(x, cdir=-1) == pi + I*log(sqrt(3) + 2) + + +def test_acos_series(): + assert acos(x).series(x, 0, 8) == \ + pi/2 - x - x**3/6 - 3*x**5/40 - 5*x**7/112 + O(x**8) + assert acos(x).series(x, 0, 8) == pi/2 - asin(x).series(x, 0, 8) + t5 = acos(x).taylor_term(5, x) + assert t5 == -3*x**5/40 + assert acos(x).taylor_term(7, x, t5, 0) == -5*x**7/112 + assert acos(x).taylor_term(0, x) == pi/2 + assert acos(x).taylor_term(2, x) is S.Zero + + +def test_acos_rewrite(): + assert acos(x).rewrite(log) == pi/2 + I*log(I*x + sqrt(1 - x**2)) + assert acos(x).rewrite(atan) == pi*(-x*sqrt(x**(-2)) + 1)/2 + atan(sqrt(1 - x**2)/x) + assert acos(0).rewrite(atan) == S.Pi/2 + assert acos(0.5).rewrite(atan) == acos(0.5).rewrite(log) + assert acos(x).rewrite(asin) == S.Pi/2 - asin(x) + assert acos(x).rewrite(acot) == -2*acot((sqrt(-x**2 + 1) + 1)/x) + pi/2 + assert acos(x).rewrite(asec) == asec(1/x) + assert acos(x).rewrite(acsc) == -acsc(1/x) + pi/2 + + +def test_acos_fdiff(): + assert acos(x).fdiff() == -1/sqrt(1 - x**2) + raises(ArgumentIndexError, lambda: acos(x).fdiff(2)) + + +def test_atan(): + assert atan(nan) is nan + + assert atan.nargs == FiniteSet(1) + assert atan(oo) == pi/2 + assert atan(-oo) == -pi/2 + assert atan(zoo) == AccumBounds(-pi/2, pi/2) + + assert atan(0) == 0 + assert atan(1) == pi/4 + assert atan(sqrt(3)) == pi/3 + assert atan(-(1 + sqrt(2))) == pi*Rational(-3, 8) + assert atan(sqrt(5 - 2 * sqrt(5))) == pi/5 + assert atan(-sqrt(1 - 2 * sqrt(5)/ 5)) == -pi/10 + assert atan(sqrt(1 + 2 * sqrt(5) / 5)) == pi*Rational(3, 10) + assert atan(-2 + sqrt(3)) == -pi/12 + assert atan(2 + sqrt(3)) == pi*Rational(5, 12) + assert atan(-2 - sqrt(3)) == pi*Rational(-5, 12) + + # check round-trip for exact values: + for d in [5, 6, 8, 10, 12]: + for num in range(-(d//2), d//2 + 1): + if gcd(num, d) == 1: + assert atan(tan(num*pi/d)) == num*pi/d + + assert atan(oo) == pi/2 + assert atan(x).diff(x) == 1/(1 + x**2) + + assert atan(r).is_real is True + + assert atan(-2*I) == -I*atanh(2) + assert unchanged(atan, cot(x)) + assert atan(cot(Rational(1, 4))) == Rational(-1, 4) + pi/2 + assert acot(Rational(1, 4)).is_rational is False + + for s in (x, p, n, np, nn, nz, ep, en, enp, enn, enz): + if s.is_real or s.is_extended_real is None: + assert s.is_nonzero is atan(s).is_nonzero + assert s.is_positive is atan(s).is_positive + assert s.is_negative is atan(s).is_negative + assert s.is_nonpositive is atan(s).is_nonpositive + assert s.is_nonnegative is atan(s).is_nonnegative + else: + assert s.is_extended_nonzero is atan(s).is_nonzero + assert s.is_extended_positive is atan(s).is_positive + assert s.is_extended_negative is atan(s).is_negative + assert s.is_extended_nonpositive is atan(s).is_nonpositive + assert s.is_extended_nonnegative is atan(s).is_nonnegative + assert s.is_extended_nonzero is atan(s).is_extended_nonzero + assert s.is_extended_positive is atan(s).is_extended_positive + assert s.is_extended_negative is atan(s).is_extended_negative + assert s.is_extended_nonpositive is atan(s).is_extended_nonpositive + assert s.is_extended_nonnegative is atan(s).is_extended_nonnegative + + +def test_atan_rewrite(): + assert atan(x).rewrite(log) == I*(log(1 - I*x)-log(1 + I*x))/2 + assert atan(x).rewrite(asin) == (-asin(1/sqrt(x**2 + 1)) + pi/2)*sqrt(x**2)/x + assert atan(x).rewrite(acos) == sqrt(x**2)*acos(1/sqrt(x**2 + 1))/x + assert atan(x).rewrite(acot) == acot(1/x) + assert atan(x).rewrite(asec) == sqrt(x**2)*asec(sqrt(x**2 + 1))/x + assert atan(x).rewrite(acsc) == (-acsc(sqrt(x**2 + 1)) + pi/2)*sqrt(x**2)/x + + assert atan(-5*I).evalf() == atan(x).rewrite(log).evalf(subs={x:-5*I}) + assert atan(5*I).evalf() == atan(x).rewrite(log).evalf(subs={x:5*I}) + + +def test_atan_fdiff(): + assert atan(x).fdiff() == 1/(x**2 + 1) + raises(ArgumentIndexError, lambda: atan(x).fdiff(2)) + + +def test_atan_leading_term(): + assert atan(x).as_leading_term(x) == x + assert atan(1/x).as_leading_term(x, cdir=1) == pi/2 + assert atan(1/x).as_leading_term(x, cdir=-1) == -pi/2 + # Tests concerning branch points + assert atan(x + I).as_leading_term(x, cdir=1) == -I*log(x)/2 + pi/4 + I*log(2)/2 + assert atan(x + I).as_leading_term(x, cdir=-1) == -I*log(x)/2 - 3*pi/4 + I*log(2)/2 + assert atan(x - I).as_leading_term(x, cdir=1) == I*log(x)/2 + pi/4 - I*log(2)/2 + assert atan(x - I).as_leading_term(x, cdir=-1) == I*log(x)/2 + pi/4 - I*log(2)/2 + # Tests concerning points lying on branch cuts + assert atan(x + 2*I).as_leading_term(x, cdir=1) == I*atanh(2) + assert atan(x + 2*I).as_leading_term(x, cdir=-1) == -pi + I*atanh(2) + assert atan(x - 2*I).as_leading_term(x, cdir=1) == pi - I*atanh(2) + assert atan(x - 2*I).as_leading_term(x, cdir=-1) == -I*atanh(2) + # Tests concerning re(ndir) == 0 + assert atan(2*I - I*x - x**2).as_leading_term(x, cdir=1) == -pi/2 + I*log(3)/2 + assert atan(2*I - I*x - x**2).as_leading_term(x, cdir=-1) == -pi/2 + I*log(3)/2 + + +def test_atan2(): + assert atan2.nargs == FiniteSet(2) + assert atan2(0, 0) is S.NaN + assert atan2(0, 1) == 0 + assert atan2(1, 1) == pi/4 + assert atan2(1, 0) == pi/2 + assert atan2(1, -1) == pi*Rational(3, 4) + assert atan2(0, -1) == pi + assert atan2(-1, -1) == pi*Rational(-3, 4) + assert atan2(-1, 0) == -pi/2 + assert atan2(-1, 1) == -pi/4 + i = symbols('i', imaginary=True) + r = symbols('r', real=True) + eq = atan2(r, i) + ans = -I*log((i + I*r)/sqrt(i**2 + r**2)) + reps = ((r, 2), (i, I)) + assert eq.subs(reps) == ans.subs(reps) + + x = Symbol('x', negative=True) + y = Symbol('y', negative=True) + assert atan2(y, x) == atan(y/x) - pi + y = Symbol('y', nonnegative=True) + assert atan2(y, x) == atan(y/x) + pi + y = Symbol('y') + assert atan2(y, x) == atan2(y, x, evaluate=False) + + u = Symbol("u", positive=True) + assert atan2(0, u) == 0 + u = Symbol("u", negative=True) + assert atan2(0, u) == pi + + assert atan2(y, oo) == 0 + assert atan2(y, -oo)== 2*pi*Heaviside(re(y), S.Half) - pi + + assert atan2(y, x).rewrite(log) == -I*log((x + I*y)/sqrt(x**2 + y**2)) + assert atan2(0, 0) is S.NaN + + ex = atan2(y, x) - arg(x + I*y) + assert ex.subs({x:2, y:3}).rewrite(arg) == 0 + assert ex.subs({x:2, y:3*I}).rewrite(arg) == -pi - I*log(sqrt(5)*I/5) + assert ex.subs({x:2*I, y:3}).rewrite(arg) == -pi/2 - I*log(sqrt(5)*I) + assert ex.subs({x:2*I, y:3*I}).rewrite(arg) == -pi + atan(Rational(2, 3)) + atan(Rational(3, 2)) + i = symbols('i', imaginary=True) + r = symbols('r', real=True) + e = atan2(i, r) + rewrite = e.rewrite(arg) + reps = {i: I, r: -2} + assert rewrite == -I*log(abs(I*i + r)/sqrt(abs(i**2 + r**2))) + arg((I*i + r)/sqrt(i**2 + r**2)) + assert (e - rewrite).subs(reps).equals(0) + + assert atan2(0, x).rewrite(atan) == Piecewise((pi, re(x) < 0), + (0, Ne(x, 0)), + (nan, True)) + assert atan2(0, r).rewrite(atan) == Piecewise((pi, r < 0), (0, Ne(r, 0)), (S.NaN, True)) + assert atan2(0, i),rewrite(atan) == 0 + assert atan2(0, r + i).rewrite(atan) == Piecewise((pi, r < 0), (0, True)) + + assert atan2(y, x).rewrite(atan) == Piecewise( + (2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)), + (pi, re(x) < 0), + (0, (re(x) > 0) | Ne(im(x), 0)), + (nan, True)) + assert conjugate(atan2(x, y)) == atan2(conjugate(x), conjugate(y)) + + assert diff(atan2(y, x), x) == -y/(x**2 + y**2) + assert diff(atan2(y, x), y) == x/(x**2 + y**2) + + assert simplify(diff(atan2(y, x).rewrite(log), x)) == -y/(x**2 + y**2) + assert simplify(diff(atan2(y, x).rewrite(log), y)) == x/(x**2 + y**2) + + assert str(atan2(1, 2).evalf(5)) == '0.46365' + raises(ArgumentIndexError, lambda: atan2(x, y).fdiff(3)) + +def test_issue_17461(): + class A(Symbol): + is_extended_real = True + + def _eval_evalf(self, prec): + return Float(5.0) + + x = A('X') + y = A('Y') + assert abs(atan2(x, y).evalf() - 0.785398163397448) <= 1e-10 + +def test_acot(): + assert acot(nan) is nan + + assert acot.nargs == FiniteSet(1) + assert acot(-oo) == 0 + assert acot(oo) == 0 + assert acot(zoo) == 0 + assert acot(1) == pi/4 + assert acot(0) == pi/2 + assert acot(sqrt(3)/3) == pi/3 + assert acot(1/sqrt(3)) == pi/3 + assert acot(-1/sqrt(3)) == -pi/3 + assert acot(x).diff(x) == -1/(1 + x**2) + + assert acot(r).is_extended_real is True + + assert acot(I*pi) == -I*acoth(pi) + assert acot(-2*I) == I*acoth(2) + assert acot(x).is_positive is None + assert acot(n).is_positive is False + assert acot(p).is_positive is True + assert acot(I).is_positive is False + assert acot(Rational(1, 4)).is_rational is False + assert unchanged(acot, cot(x)) + assert unchanged(acot, tan(x)) + assert acot(cot(Rational(1, 4))) == Rational(1, 4) + assert acot(tan(Rational(-1, 4))) == Rational(1, 4) - pi/2 + + +def test_acot_rewrite(): + assert acot(x).rewrite(log) == I*(log(1 - I/x)-log(1 + I/x))/2 + assert acot(x).rewrite(asin) == x*(-asin(sqrt(-x**2)/sqrt(-x**2 - 1)) + pi/2)*sqrt(x**(-2)) + assert acot(x).rewrite(acos) == x*sqrt(x**(-2))*acos(sqrt(-x**2)/sqrt(-x**2 - 1)) + assert acot(x).rewrite(atan) == atan(1/x) + assert acot(x).rewrite(asec) == x*sqrt(x**(-2))*asec(sqrt((x**2 + 1)/x**2)) + assert acot(x).rewrite(acsc) == x*(-acsc(sqrt((x**2 + 1)/x**2)) + pi/2)*sqrt(x**(-2)) + + assert acot(-I/5).evalf() == acot(x).rewrite(log).evalf(subs={x:-I/5}) + assert acot(I/5).evalf() == acot(x).rewrite(log).evalf(subs={x:I/5}) + + +def test_acot_fdiff(): + assert acot(x).fdiff() == -1/(x**2 + 1) + raises(ArgumentIndexError, lambda: acot(x).fdiff(2)) + +def test_acot_leading_term(): + assert acot(1/x).as_leading_term(x) == x + # Tests concerning branch points + assert acot(x + I).as_leading_term(x, cdir=1) == I*log(x)/2 + pi/4 - I*log(2)/2 + assert acot(x + I).as_leading_term(x, cdir=-1) == I*log(x)/2 + pi/4 - I*log(2)/2 + assert acot(x - I).as_leading_term(x, cdir=1) == -I*log(x)/2 + pi/4 + I*log(2)/2 + assert acot(x - I).as_leading_term(x, cdir=-1) == -I*log(x)/2 - 3*pi/4 + I*log(2)/2 + # Tests concerning points lying on branch cuts + assert acot(x).as_leading_term(x, cdir=1) == pi/2 + assert acot(x).as_leading_term(x, cdir=-1) == -pi/2 + assert acot(x + I/2).as_leading_term(x, cdir=1) == pi - I*acoth(S(1)/2) + assert acot(x + I/2).as_leading_term(x, cdir=-1) == -I*acoth(S(1)/2) + assert acot(x - I/2).as_leading_term(x, cdir=1) == I*acoth(S(1)/2) + assert acot(x - I/2).as_leading_term(x, cdir=-1) == -pi + I*acoth(S(1)/2) + # Tests concerning re(ndir) == 0 + assert acot(I/2 - I*x - x**2).as_leading_term(x, cdir=1) == -pi/2 - I*log(3)/2 + assert acot(I/2 - I*x - x**2).as_leading_term(x, cdir=-1) == -pi/2 - I*log(3)/2 + + +def test_attributes(): + assert sin(x).args == (x,) + + +def test_sincos_rewrite(): + assert sin(pi/2 - x) == cos(x) + assert sin(pi - x) == sin(x) + assert cos(pi/2 - x) == sin(x) + assert cos(pi - x) == -cos(x) + + +def _check_even_rewrite(func, arg): + """Checks that the expr has been rewritten using f(-x) -> f(x) + arg : -x + """ + return func(arg).args[0] == -arg + + +def _check_odd_rewrite(func, arg): + """Checks that the expr has been rewritten using f(-x) -> -f(x) + arg : -x + """ + return func(arg).func.is_Mul + + +def _check_no_rewrite(func, arg): + """Checks that the expr is not rewritten""" + return func(arg).args[0] == arg + + +def test_evenodd_rewrite(): + a = cos(2) # negative + b = sin(1) # positive + even = [cos] + odd = [sin, tan, cot, asin, atan, acot] + with_minus = [-1, -2**1024 * E, -pi/105, -x*y, -x - y] + for func in even: + for expr in with_minus: + assert _check_even_rewrite(func, expr) + assert _check_no_rewrite(func, a*b) + assert func( + x - y) == func(y - x) # it doesn't matter which form is canonical + for func in odd: + for expr in with_minus: + assert _check_odd_rewrite(func, expr) + assert _check_no_rewrite(func, a*b) + assert func( + x - y) == -func(y - x) # it doesn't matter which form is canonical + + +def test_as_leading_term_issue_5272(): + assert sin(x).as_leading_term(x) == x + assert cos(x).as_leading_term(x) == 1 + assert tan(x).as_leading_term(x) == x + assert cot(x).as_leading_term(x) == 1/x + + +def test_leading_terms(): + assert sin(1/x).as_leading_term(x) == AccumBounds(-1, 1) + assert sin(S.Half).as_leading_term(x) == sin(S.Half) + assert cos(1/x).as_leading_term(x) == AccumBounds(-1, 1) + assert cos(S.Half).as_leading_term(x) == cos(S.Half) + assert sec(1/x).as_leading_term(x) == AccumBounds(S.NegativeInfinity, S.Infinity) + assert csc(1/x).as_leading_term(x) == AccumBounds(S.NegativeInfinity, S.Infinity) + assert tan(1/x).as_leading_term(x) == AccumBounds(S.NegativeInfinity, S.Infinity) + assert cot(1/x).as_leading_term(x) == AccumBounds(S.NegativeInfinity, S.Infinity) + + # https://github.com/sympy/sympy/issues/21038 + f = sin(pi*(x + 4))/(3*x) + assert f.as_leading_term(x) == pi/3 + + +def test_atan2_expansion(): + assert cancel(atan2(x**2, x + 1).diff(x) - atan(x**2/(x + 1)).diff(x)) == 0 + assert cancel(atan(y/x).series(y, 0, 5) - atan2(y, x).series(y, 0, 5) + + atan2(0, x) - atan(0)) == O(y**5) + assert cancel(atan(y/x).series(x, 1, 4) - atan2(y, x).series(x, 1, 4) + + atan2(y, 1) - atan(y)) == O((x - 1)**4, (x, 1)) + assert cancel(atan((y + x)/x).series(x, 1, 3) - atan2(y + x, x).series(x, 1, 3) + + atan2(1 + y, 1) - atan(1 + y)) == O((x - 1)**3, (x, 1)) + assert Matrix([atan2(y, x)]).jacobian([y, x]) == \ + Matrix([[x/(y**2 + x**2), -y/(y**2 + x**2)]]) + + +def test_aseries(): + def t(n, v, d, e): + assert abs( + n(1/v).evalf() - n(1/x).series(x, dir=d).removeO().subs(x, v)) < e + t(atan, 0.1, '+', 1e-5) + t(atan, -0.1, '-', 1e-5) + t(acot, 0.1, '+', 1e-5) + t(acot, -0.1, '-', 1e-5) + + +def test_issue_4420(): + i = Symbol('i', integer=True) + e = Symbol('e', even=True) + o = Symbol('o', odd=True) + + # unknown parity for variable + assert cos(4*i*pi) == 1 + assert sin(4*i*pi) == 0 + assert tan(4*i*pi) == 0 + assert cot(4*i*pi) is zoo + + assert cos(3*i*pi) == cos(pi*i) # +/-1 + assert sin(3*i*pi) == 0 + assert tan(3*i*pi) == 0 + assert cot(3*i*pi) is zoo + + assert cos(4.0*i*pi) == 1 + assert sin(4.0*i*pi) == 0 + assert tan(4.0*i*pi) == 0 + assert cot(4.0*i*pi) is zoo + + assert cos(3.0*i*pi) == cos(pi*i) # +/-1 + assert sin(3.0*i*pi) == 0 + assert tan(3.0*i*pi) == 0 + assert cot(3.0*i*pi) is zoo + + assert cos(4.5*i*pi) == cos(0.5*pi*i) + assert sin(4.5*i*pi) == sin(0.5*pi*i) + assert tan(4.5*i*pi) == tan(0.5*pi*i) + assert cot(4.5*i*pi) == cot(0.5*pi*i) + + # parity of variable is known + assert cos(4*e*pi) == 1 + assert sin(4*e*pi) == 0 + assert tan(4*e*pi) == 0 + assert cot(4*e*pi) is zoo + + assert cos(3*e*pi) == 1 + assert sin(3*e*pi) == 0 + assert tan(3*e*pi) == 0 + assert cot(3*e*pi) is zoo + + assert cos(4.0*e*pi) == 1 + assert sin(4.0*e*pi) == 0 + assert tan(4.0*e*pi) == 0 + assert cot(4.0*e*pi) is zoo + + assert cos(3.0*e*pi) == 1 + assert sin(3.0*e*pi) == 0 + assert tan(3.0*e*pi) == 0 + assert cot(3.0*e*pi) is zoo + + assert cos(4.5*e*pi) == cos(0.5*pi*e) + assert sin(4.5*e*pi) == sin(0.5*pi*e) + assert tan(4.5*e*pi) == tan(0.5*pi*e) + assert cot(4.5*e*pi) == cot(0.5*pi*e) + + assert cos(4*o*pi) == 1 + assert sin(4*o*pi) == 0 + assert tan(4*o*pi) == 0 + assert cot(4*o*pi) is zoo + + assert cos(3*o*pi) == -1 + assert sin(3*o*pi) == 0 + assert tan(3*o*pi) == 0 + assert cot(3*o*pi) is zoo + + assert cos(4.0*o*pi) == 1 + assert sin(4.0*o*pi) == 0 + assert tan(4.0*o*pi) == 0 + assert cot(4.0*o*pi) is zoo + + assert cos(3.0*o*pi) == -1 + assert sin(3.0*o*pi) == 0 + assert tan(3.0*o*pi) == 0 + assert cot(3.0*o*pi) is zoo + + assert cos(4.5*o*pi) == cos(0.5*pi*o) + assert sin(4.5*o*pi) == sin(0.5*pi*o) + assert tan(4.5*o*pi) == tan(0.5*pi*o) + assert cot(4.5*o*pi) == cot(0.5*pi*o) + + # x could be imaginary + assert cos(4*x*pi) == cos(4*pi*x) + assert sin(4*x*pi) == sin(4*pi*x) + assert tan(4*x*pi) == tan(4*pi*x) + assert cot(4*x*pi) == cot(4*pi*x) + + assert cos(3*x*pi) == cos(3*pi*x) + assert sin(3*x*pi) == sin(3*pi*x) + assert tan(3*x*pi) == tan(3*pi*x) + assert cot(3*x*pi) == cot(3*pi*x) + + assert cos(4.0*x*pi) == cos(4.0*pi*x) + assert sin(4.0*x*pi) == sin(4.0*pi*x) + assert tan(4.0*x*pi) == tan(4.0*pi*x) + assert cot(4.0*x*pi) == cot(4.0*pi*x) + + assert cos(3.0*x*pi) == cos(3.0*pi*x) + assert sin(3.0*x*pi) == sin(3.0*pi*x) + assert tan(3.0*x*pi) == tan(3.0*pi*x) + assert cot(3.0*x*pi) == cot(3.0*pi*x) + + assert cos(4.5*x*pi) == cos(4.5*pi*x) + assert sin(4.5*x*pi) == sin(4.5*pi*x) + assert tan(4.5*x*pi) == tan(4.5*pi*x) + assert cot(4.5*x*pi) == cot(4.5*pi*x) + + +def test_inverses(): + raises(AttributeError, lambda: sin(x).inverse()) + raises(AttributeError, lambda: cos(x).inverse()) + assert tan(x).inverse() == atan + assert cot(x).inverse() == acot + raises(AttributeError, lambda: csc(x).inverse()) + raises(AttributeError, lambda: sec(x).inverse()) + assert asin(x).inverse() == sin + assert acos(x).inverse() == cos + assert atan(x).inverse() == tan + assert acot(x).inverse() == cot + + +def test_real_imag(): + a, b = symbols('a b', real=True) + z = a + b*I + for deep in [True, False]: + assert sin( + z).as_real_imag(deep=deep) == (sin(a)*cosh(b), cos(a)*sinh(b)) + assert cos( + z).as_real_imag(deep=deep) == (cos(a)*cosh(b), -sin(a)*sinh(b)) + assert tan(z).as_real_imag(deep=deep) == (sin(2*a)/(cos(2*a) + + cosh(2*b)), sinh(2*b)/(cos(2*a) + cosh(2*b))) + assert cot(z).as_real_imag(deep=deep) == (-sin(2*a)/(cos(2*a) - + cosh(2*b)), sinh(2*b)/(cos(2*a) - cosh(2*b))) + assert sin(a).as_real_imag(deep=deep) == (sin(a), 0) + assert cos(a).as_real_imag(deep=deep) == (cos(a), 0) + assert tan(a).as_real_imag(deep=deep) == (tan(a), 0) + assert cot(a).as_real_imag(deep=deep) == (cot(a), 0) + + +@slow +def test_sincos_rewrite_sqrt(): + # equivalent to testing rewrite(pow) + for p in [1, 3, 5, 17]: + for t in [1, 8]: + n = t*p + # The vertices `exp(i*pi/n)` of a regular `n`-gon can + # be expressed by means of nested square roots if and + # only if `n` is a product of Fermat primes, `p`, and + # powers of 2, `t'. The code aims to check all vertices + # not belonging to an `m`-gon for `m < n`(`gcd(i, n) == 1`). + # For large `n` this makes the test too slow, therefore + # the vertices are limited to those of index `i < 10`. + for i in range(1, min((n + 1)//2 + 1, 10)): + if 1 == gcd(i, n): + x = i*pi/n + s1 = sin(x).rewrite(sqrt) + c1 = cos(x).rewrite(sqrt) + assert not s1.has(cos, sin), "fails for %d*pi/%d" % (i, n) + assert not c1.has(cos, sin), "fails for %d*pi/%d" % (i, n) + assert 1e-3 > abs(sin(x.evalf(5)) - s1.evalf(2)), "fails for %d*pi/%d" % (i, n) + assert 1e-3 > abs(cos(x.evalf(5)) - c1.evalf(2)), "fails for %d*pi/%d" % (i, n) + assert cos(pi/14).rewrite(sqrt) == sqrt(cos(pi/7)/2 + S.Half) + assert cos(pi*Rational(-15, 2)/11, evaluate=False).rewrite( + sqrt) == -sqrt(-cos(pi*Rational(4, 11))/2 + S.Half) + assert cos(Mul(2, pi, S.Half, evaluate=False), evaluate=False).rewrite( + sqrt) == -1 + e = cos(pi/3/17) # don't use pi/15 since that is caught at instantiation + a = ( + -3*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17) + 17)/64 - + 3*sqrt(34)*sqrt(sqrt(17) + 17)/128 - sqrt(sqrt(17) + + 17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + 17) + + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 - sqrt(-sqrt(17) + + 17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/128 - Rational(1, 32) + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 + + 3*sqrt(2)*sqrt(sqrt(17) + 17)/128 + sqrt(34)*sqrt(-sqrt(17) + 17)/128 + + 13*sqrt(2)*sqrt(-sqrt(17) + 17)/128 + sqrt(17)*sqrt(-sqrt(17) + + 17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + 17) + + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/128 + 5*sqrt(17)/32 + + sqrt(3)*sqrt(-sqrt(2)*sqrt(sqrt(17) + 17)*sqrt(sqrt(17)/32 + + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/8 - + 5*sqrt(2)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + + Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 - + 3*sqrt(2)*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 + + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/32 + + sqrt(34)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + + Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 + + sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/2 + + S.Half + sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + + 17)/32 + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - + sqrt(2)*sqrt(-sqrt(17) + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + + 6*sqrt(17) + 34)/32 + Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - + sqrt(2)*sqrt(-sqrt(17) + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + + 6*sqrt(17) + 34)/32 + sqrt(34)*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 + + sqrt(2)*sqrt(-sqrt(17) + 17)/32 + + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + + Rational(15, 32))/32)/2) + assert e.rewrite(sqrt) == a + assert e.n() == a.n() + # coverage of fermatCoords: multiplicity > 1; the following could be + # different but that portion of the code should be tested in some way + assert cos(pi/9/17).rewrite(sqrt) == \ + sin(pi/9)*sin(pi*Rational(2, 17)) + cos(pi/9)*cos(pi*Rational(2, 17)) + + +@slow +def test_sincos_rewrite_sqrt_257(): + assert cos(pi/257).rewrite(sqrt).evalf(64) == cos(pi/257).evalf(64) + + +@slow +def test_tancot_rewrite_sqrt(): + # equivalent to testing rewrite(pow) + for p in [1, 3, 5, 17]: + for t in [1, 8]: + n = t*p + for i in range(1, min((n + 1)//2 + 1, 10)): + if 1 == gcd(i, n): + x = i*pi/n + if 2*i != n and 3*i != 2*n: + t1 = tan(x).rewrite(sqrt) + assert not t1.has(cot, tan), "fails for %d*pi/%d" % (i, n) + assert 1e-3 > abs( tan(x.evalf(7)) - t1.evalf(4) ), "fails for %d*pi/%d" % (i, n) + if i != 0 and i != n: + c1 = cot(x).rewrite(sqrt) + assert not c1.has(cot, tan), "fails for %d*pi/%d" % (i, n) + assert 1e-3 > abs( cot(x.evalf(7)) - c1.evalf(4) ), "fails for %d*pi/%d" % (i, n) + + +def test_sec(): + x = symbols('x', real=True) + z = symbols('z') + + assert sec.nargs == FiniteSet(1) + + assert sec(zoo) is nan + assert sec(0) == 1 + assert sec(pi) == -1 + assert sec(pi/2) is zoo + assert sec(-pi/2) is zoo + assert sec(pi/6) == 2*sqrt(3)/3 + assert sec(pi/3) == 2 + assert sec(pi*Rational(5, 2)) is zoo + assert sec(pi*Rational(9, 7)) == -sec(pi*Rational(2, 7)) + assert sec(pi*Rational(3, 4)) == -sqrt(2) # issue 8421 + assert sec(I) == 1/cosh(1) + assert sec(x*I) == 1/cosh(x) + assert sec(-x) == sec(x) + + assert sec(asec(x)) == x + + assert sec(z).conjugate() == sec(conjugate(z)) + + assert (sec(z).as_real_imag() == + (cos(re(z))*cosh(im(z))/(sin(re(z))**2*sinh(im(z))**2 + + cos(re(z))**2*cosh(im(z))**2), + sin(re(z))*sinh(im(z))/(sin(re(z))**2*sinh(im(z))**2 + + cos(re(z))**2*cosh(im(z))**2))) + + assert sec(x).expand(trig=True) == 1/cos(x) + assert sec(2*x).expand(trig=True) == 1/(2*cos(x)**2 - 1) + + assert sec(x).is_extended_real == True + assert sec(z).is_real == None + + assert sec(a).is_algebraic is None + assert sec(na).is_algebraic is False + + assert sec(x).as_leading_term() == sec(x) + + assert sec(0, evaluate=False).is_finite == True + assert sec(x).is_finite == None + assert sec(pi/2, evaluate=False).is_finite == False + + assert series(sec(x), x, x0=0, n=6) == 1 + x**2/2 + 5*x**4/24 + O(x**6) + + # https://github.com/sympy/sympy/issues/7166 + assert series(sqrt(sec(x))) == 1 + x**2/4 + 7*x**4/96 + O(x**6) + + # https://github.com/sympy/sympy/issues/7167 + assert (series(sqrt(sec(x)), x, x0=pi*3/2, n=4) == + 1/sqrt(x - pi*Rational(3, 2)) + (x - pi*Rational(3, 2))**Rational(3, 2)/12 + + (x - pi*Rational(3, 2))**Rational(7, 2)/160 + O((x - pi*Rational(3, 2))**4, (x, pi*Rational(3, 2)))) + + assert sec(x).diff(x) == tan(x)*sec(x) + + # Taylor Term checks + assert sec(z).taylor_term(4, z) == 5*z**4/24 + assert sec(z).taylor_term(6, z) == 61*z**6/720 + assert sec(z).taylor_term(5, z) == 0 + + +def test_sec_rewrite(): + assert sec(x).rewrite(exp) == 1/(exp(I*x)/2 + exp(-I*x)/2) + assert sec(x).rewrite(cos) == 1/cos(x) + assert sec(x).rewrite(tan) == (tan(x/2)**2 + 1)/(-tan(x/2)**2 + 1) + assert sec(x).rewrite(pow) == sec(x) + assert sec(x).rewrite(sqrt) == sec(x) + assert sec(z).rewrite(cot) == (cot(z/2)**2 + 1)/(cot(z/2)**2 - 1) + assert sec(x).rewrite(sin) == 1 / sin(x + pi / 2, evaluate=False) + assert sec(x).rewrite(tan) == (tan(x / 2)**2 + 1) / (-tan(x / 2)**2 + 1) + assert sec(x).rewrite(csc) == csc(-x + pi/2, evaluate=False) + assert sec(x).rewrite(besselj) == Piecewise( + (sqrt(2)/(sqrt(pi*x)*besselj(-S.Half, x)), Ne(x, 0)), + (1, True) + ) + assert sec(x).rewrite(besselj).subs(x, 0) == sec(0) + + +def test_sec_fdiff(): + assert sec(x).fdiff() == tan(x)*sec(x) + raises(ArgumentIndexError, lambda: sec(x).fdiff(2)) + + +def test_csc(): + x = symbols('x', real=True) + z = symbols('z') + + # https://github.com/sympy/sympy/issues/6707 + cosecant = csc('x') + alternate = 1/sin('x') + assert cosecant.equals(alternate) == True + assert alternate.equals(cosecant) == True + + assert csc.nargs == FiniteSet(1) + + assert csc(0) is zoo + assert csc(pi) is zoo + assert csc(zoo) is nan + + assert csc(pi/2) == 1 + assert csc(-pi/2) == -1 + assert csc(pi/6) == 2 + assert csc(pi/3) == 2*sqrt(3)/3 + assert csc(pi*Rational(5, 2)) == 1 + assert csc(pi*Rational(9, 7)) == -csc(pi*Rational(2, 7)) + assert csc(pi*Rational(3, 4)) == sqrt(2) # issue 8421 + assert csc(I) == -I/sinh(1) + assert csc(x*I) == -I/sinh(x) + assert csc(-x) == -csc(x) + + assert csc(acsc(x)) == x + + assert csc(z).conjugate() == csc(conjugate(z)) + + assert (csc(z).as_real_imag() == + (sin(re(z))*cosh(im(z))/(sin(re(z))**2*cosh(im(z))**2 + + cos(re(z))**2*sinh(im(z))**2), + -cos(re(z))*sinh(im(z))/(sin(re(z))**2*cosh(im(z))**2 + + cos(re(z))**2*sinh(im(z))**2))) + + assert csc(x).expand(trig=True) == 1/sin(x) + assert csc(2*x).expand(trig=True) == 1/(2*sin(x)*cos(x)) + + assert csc(x).is_extended_real == True + assert csc(z).is_real == None + + assert csc(a).is_algebraic is None + assert csc(na).is_algebraic is False + + assert csc(x).as_leading_term() == csc(x) + + assert csc(0, evaluate=False).is_finite == False + assert csc(x).is_finite == None + assert csc(pi/2, evaluate=False).is_finite == True + + assert series(csc(x), x, x0=pi/2, n=6) == \ + 1 + (x - pi/2)**2/2 + 5*(x - pi/2)**4/24 + O((x - pi/2)**6, (x, pi/2)) + assert series(csc(x), x, x0=0, n=6) == \ + 1/x + x/6 + 7*x**3/360 + 31*x**5/15120 + O(x**6) + + assert csc(x).diff(x) == -cot(x)*csc(x) + + assert csc(x).taylor_term(2, x) == 0 + assert csc(x).taylor_term(3, x) == 7*x**3/360 + assert csc(x).taylor_term(5, x) == 31*x**5/15120 + raises(ArgumentIndexError, lambda: csc(x).fdiff(2)) + + +def test_asec(): + z = Symbol('z', zero=True) + assert asec(z) is zoo + assert asec(nan) is nan + assert asec(1) == 0 + assert asec(-1) == pi + assert asec(oo) == pi/2 + assert asec(-oo) == pi/2 + assert asec(zoo) == pi/2 + + assert asec(sec(pi*Rational(13, 4))) == pi*Rational(3, 4) + assert asec(1 + sqrt(5)) == pi*Rational(2, 5) + assert asec(2/sqrt(3)) == pi/6 + assert asec(sqrt(4 - 2*sqrt(2))) == pi/8 + assert asec(-sqrt(4 + 2*sqrt(2))) == pi*Rational(5, 8) + assert asec(sqrt(2 + 2*sqrt(5)/5)) == pi*Rational(3, 10) + assert asec(-sqrt(2 + 2*sqrt(5)/5)) == pi*Rational(7, 10) + assert asec(sqrt(2) - sqrt(6)) == pi*Rational(11, 12) + + for d in [3, 4, 6]: + for num in range(d): + if gcd(num, d) == 1: + assert asec(sec(num*pi/d)) == num*pi/d + assert asec(-sec(num*pi/d)) == pi - num*pi/d + assert asec(csc(num*pi/d)) == pi/2 - acsc(csc(num*pi/d)) + assert asec(-csc(num*pi/d)) == pi/2 - acsc(-csc(num*pi/d)) + + assert asec(x).diff(x) == 1/(x**2*sqrt(1 - 1/x**2)) + + assert asec(x).rewrite(log) == I*log(sqrt(1 - 1/x**2) + I/x) + pi/2 + assert asec(x).rewrite(asin) == -asin(1/x) + pi/2 + assert asec(x).rewrite(acos) == acos(1/x) + assert asec(x).rewrite(atan) == \ + pi*(1 - sqrt(x**2)/x)/2 + sqrt(x**2)*atan(sqrt(x**2 - 1))/x + assert asec(x).rewrite(acot) == \ + pi*(1 - sqrt(x**2)/x)/2 + sqrt(x**2)*acot(1/sqrt(x**2 - 1))/x + assert asec(x).rewrite(acsc) == -acsc(x) + pi/2 + raises(ArgumentIndexError, lambda: asec(x).fdiff(2)) + + +def test_asec_is_real(): + assert asec(S.Half).is_real is False + n = Symbol('n', positive=True, integer=True) + assert asec(n).is_extended_real is True + assert asec(x).is_real is None + assert asec(r).is_real is None + t = Symbol('t', real=False, finite=True) + assert asec(t).is_real is False + + +def test_asec_leading_term(): + assert asec(1/x).as_leading_term(x) == pi/2 + # Tests concerning branch points + assert asec(x + 1).as_leading_term(x) == sqrt(2)*sqrt(x) + assert asec(x - 1).as_leading_term(x) == pi + # Tests concerning points lying on branch cuts + assert asec(x).as_leading_term(x, cdir=1) == -I*log(x) + I*log(2) + assert asec(x).as_leading_term(x, cdir=-1) == I*log(x) + 2*pi - I*log(2) + assert asec(I*x + 1/2).as_leading_term(x, cdir=1) == asec(1/2) + assert asec(-I*x + 1/2).as_leading_term(x, cdir=1) == -asec(1/2) + assert asec(I*x - 1/2).as_leading_term(x, cdir=1) == 2*pi - asec(-1/2) + assert asec(-I*x - 1/2).as_leading_term(x, cdir=1) == asec(-1/2) + # Tests concerning im(ndir) == 0 + assert asec(-I*x**2 + x - S(1)/2).as_leading_term(x, cdir=1) == pi + I*log(2 - sqrt(3)) + assert asec(-I*x**2 + x - S(1)/2).as_leading_term(x, cdir=-1) == pi + I*log(2 - sqrt(3)) + + +def test_asec_series(): + assert asec(x).series(x, 0, 9) == \ + I*log(2) - I*log(x) - I*x**2/4 - 3*I*x**4/32 \ + - 5*I*x**6/96 - 35*I*x**8/1024 + O(x**9) + t4 = asec(x).taylor_term(4, x) + assert t4 == -3*I*x**4/32 + assert asec(x).taylor_term(6, x, t4, 0) == -5*I*x**6/96 + + +def test_acsc(): + assert acsc(nan) is nan + assert acsc(1) == pi/2 + assert acsc(-1) == -pi/2 + assert acsc(oo) == 0 + assert acsc(-oo) == 0 + assert acsc(zoo) == 0 + assert acsc(0) is zoo + + assert acsc(csc(3)) == -3 + pi + assert acsc(csc(4)) == -4 + pi + assert acsc(csc(6)) == 6 - 2*pi + assert unchanged(acsc, csc(x)) + assert unchanged(acsc, sec(x)) + + assert acsc(2/sqrt(3)) == pi/3 + assert acsc(csc(pi*Rational(13, 4))) == -pi/4 + assert acsc(sqrt(2 + 2*sqrt(5)/5)) == pi/5 + assert acsc(-sqrt(2 + 2*sqrt(5)/5)) == -pi/5 + assert acsc(-2) == -pi/6 + assert acsc(-sqrt(4 + 2*sqrt(2))) == -pi/8 + assert acsc(sqrt(4 - 2*sqrt(2))) == pi*Rational(3, 8) + assert acsc(1 + sqrt(5)) == pi/10 + assert acsc(sqrt(2) - sqrt(6)) == pi*Rational(-5, 12) + + assert acsc(x).diff(x) == -1/(x**2*sqrt(1 - 1/x**2)) + + assert acsc(x).rewrite(log) == -I*log(sqrt(1 - 1/x**2) + I/x) + assert acsc(x).rewrite(asin) == asin(1/x) + assert acsc(x).rewrite(acos) == -acos(1/x) + pi/2 + assert acsc(x).rewrite(atan) == \ + (-atan(sqrt(x**2 - 1)) + pi/2)*sqrt(x**2)/x + assert acsc(x).rewrite(acot) == (-acot(1/sqrt(x**2 - 1)) + pi/2)*sqrt(x**2)/x + assert acsc(x).rewrite(asec) == -asec(x) + pi/2 + raises(ArgumentIndexError, lambda: acsc(x).fdiff(2)) + + +def test_csc_rewrite(): + assert csc(x).rewrite(pow) == csc(x) + assert csc(x).rewrite(sqrt) == csc(x) + + assert csc(x).rewrite(exp) == 2*I/(exp(I*x) - exp(-I*x)) + assert csc(x).rewrite(sin) == 1/sin(x) + assert csc(x).rewrite(tan) == (tan(x/2)**2 + 1)/(2*tan(x/2)) + assert csc(x).rewrite(cot) == (cot(x/2)**2 + 1)/(2*cot(x/2)) + assert csc(x).rewrite(cos) == 1/cos(x - pi/2, evaluate=False) + assert csc(x).rewrite(sec) == sec(-x + pi/2, evaluate=False) + + # issue 17349 + assert csc(1 - exp(-besselj(I, I))).rewrite(cos) == \ + -1/cos(-pi/2 - 1 + cos(I*besselj(I, I)) + + I*cos(-pi/2 + I*besselj(I, I), evaluate=False), evaluate=False) + assert csc(x).rewrite(besselj) == sqrt(2)/(sqrt(pi*x)*besselj(S.Half, x)) + assert csc(x).rewrite(besselj).subs(x, 0) == csc(0) + + +def test_acsc_leading_term(): + assert acsc(1/x).as_leading_term(x) == x + # Tests concerning branch points + assert acsc(x + 1).as_leading_term(x) == pi/2 + assert acsc(x - 1).as_leading_term(x) == -pi/2 + # Tests concerning points lying on branch cuts + assert acsc(x).as_leading_term(x, cdir=1) == I*log(x) + pi/2 - I*log(2) + assert acsc(x).as_leading_term(x, cdir=-1) == -I*log(x) - 3*pi/2 + I*log(2) + assert acsc(I*x + 1/2).as_leading_term(x, cdir=1) == acsc(1/2) + assert acsc(-I*x + 1/2).as_leading_term(x, cdir=1) == pi - acsc(1/2) + assert acsc(I*x - 1/2).as_leading_term(x, cdir=1) == -pi - acsc(-1/2) + assert acsc(-I*x - 1/2).as_leading_term(x, cdir=1) == -acsc(1/2) + # Tests concerning im(ndir) == 0 + assert acsc(-I*x**2 + x - S(1)/2).as_leading_term(x, cdir=1) == -pi/2 + I*log(sqrt(3) + 2) + assert acsc(-I*x**2 + x - S(1)/2).as_leading_term(x, cdir=-1) == -pi/2 + I*log(sqrt(3) + 2) + + +def test_acsc_series(): + assert acsc(x).series(x, 0, 9) == \ + -I*log(2) + pi/2 + I*log(x) + I*x**2/4 \ + + 3*I*x**4/32 + 5*I*x**6/96 + 35*I*x**8/1024 + O(x**9) + t6 = acsc(x).taylor_term(6, x) + assert t6 == 5*I*x**6/96 + assert acsc(x).taylor_term(8, x, t6, 0) == 35*I*x**8/1024 + + +def test_asin_nseries(): + assert asin(x + 2)._eval_nseries(x, 4, None, I) == -asin(2) + pi + \ + sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + assert asin(x + 2)._eval_nseries(x, 4, None, -I) == asin(2) - \ + sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert asin(x - 2)._eval_nseries(x, 4, None, I) == -asin(2) - \ + sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert asin(x - 2)._eval_nseries(x, 4, None, -I) == asin(2) - pi + \ + sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + # testing nseries for asin at branch points + assert asin(1 + x)._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(-x) - \ + sqrt(2)*(-x)**(S(3)/2)/12 - 3*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3) + assert asin(-1 + x)._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(x) + \ + sqrt(2)*x**(S(3)/2)/12 + 3*sqrt(2)*x**(S(5)/2)/160 + O(x**3) + assert asin(exp(x))._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(-x) + \ + sqrt(2)*(-x)**(S(3)/2)/6 - sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3) + assert asin(-exp(x))._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(-x) - \ + sqrt(2)*(-x)**(S(3)/2)/6 + sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3) + + +def test_acos_nseries(): + assert acos(x + 2)._eval_nseries(x, 4, None, I) == -acos(2) - sqrt(3)*I*x/3 + \ + sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + assert acos(x + 2)._eval_nseries(x, 4, None, -I) == acos(2) + sqrt(3)*I*x/3 - \ + sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + assert acos(x - 2)._eval_nseries(x, 4, None, I) == acos(-2) + sqrt(3)*I*x/3 + \ + sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4) + assert acos(x - 2)._eval_nseries(x, 4, None, -I) == -acos(-2) + 2*pi - \ + sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4) + # testing nseries for acos at branch points + assert acos(1 + x)._eval_nseries(x, 3, None) == sqrt(2)*sqrt(-x) + \ + sqrt(2)*(-x)**(S(3)/2)/12 + 3*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3) + assert acos(-1 + x)._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(x) - \ + sqrt(2)*x**(S(3)/2)/12 - 3*sqrt(2)*x**(S(5)/2)/160 + O(x**3) + assert acos(exp(x))._eval_nseries(x, 3, None) == sqrt(2)*sqrt(-x) - \ + sqrt(2)*(-x)**(S(3)/2)/6 + sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3) + assert acos(-exp(x))._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(-x) + \ + sqrt(2)*(-x)**(S(3)/2)/6 - sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3) + + +def test_atan_nseries(): + assert atan(x + 2*I)._eval_nseries(x, 4, None, 1) == I*atanh(2) - x/3 - \ + 2*I*x**2/9 + 13*x**3/81 + O(x**4) + assert atan(x + 2*I)._eval_nseries(x, 4, None, -1) == I*atanh(2) - pi - \ + x/3 - 2*I*x**2/9 + 13*x**3/81 + O(x**4) + assert atan(x - 2*I)._eval_nseries(x, 4, None, 1) == -I*atanh(2) + pi - \ + x/3 + 2*I*x**2/9 + 13*x**3/81 + O(x**4) + assert atan(x - 2*I)._eval_nseries(x, 4, None, -1) == -I*atanh(2) - x/3 + \ + 2*I*x**2/9 + 13*x**3/81 + O(x**4) + assert atan(1/x)._eval_nseries(x, 2, None, 1) == pi/2 - x + O(x**2) + assert atan(1/x)._eval_nseries(x, 2, None, -1) == -pi/2 - x + O(x**2) + # testing nseries for atan at branch points + assert atan(x + I)._eval_nseries(x, 4, None) == I*log(2)/2 + pi/4 - \ + I*log(x)/2 + x/4 + I*x**2/16 - x**3/48 + O(x**4) + assert atan(x - I)._eval_nseries(x, 4, None) == -I*log(2)/2 + pi/4 + \ + I*log(x)/2 + x/4 - I*x**2/16 - x**3/48 + O(x**4) + + +def test_acot_nseries(): + assert acot(x + S(1)/2*I)._eval_nseries(x, 4, None, 1) == -I*acoth(S(1)/2) + \ + pi - 4*x/3 + 8*I*x**2/9 + 112*x**3/81 + O(x**4) + assert acot(x + S(1)/2*I)._eval_nseries(x, 4, None, -1) == -I*acoth(S(1)/2) - \ + 4*x/3 + 8*I*x**2/9 + 112*x**3/81 + O(x**4) + assert acot(x - S(1)/2*I)._eval_nseries(x, 4, None, 1) == I*acoth(S(1)/2) - \ + 4*x/3 - 8*I*x**2/9 + 112*x**3/81 + O(x**4) + assert acot(x - S(1)/2*I)._eval_nseries(x, 4, None, -1) == I*acoth(S(1)/2) - \ + pi - 4*x/3 - 8*I*x**2/9 + 112*x**3/81 + O(x**4) + assert acot(x)._eval_nseries(x, 2, None, 1) == pi/2 - x + O(x**2) + assert acot(x)._eval_nseries(x, 2, None, -1) == -pi/2 - x + O(x**2) + # testing nseries for acot at branch points + assert acot(x + I)._eval_nseries(x, 4, None) == -I*log(2)/2 + pi/4 + \ + I*log(x)/2 - x/4 - I*x**2/16 + x**3/48 + O(x**4) + assert acot(x - I)._eval_nseries(x, 4, None) == I*log(2)/2 + pi/4 - \ + I*log(x)/2 - x/4 + I*x**2/16 + x**3/48 + O(x**4) + + +def test_asec_nseries(): + assert asec(x + S(1)/2)._eval_nseries(x, 4, None, I) == asec(S(1)/2) - \ + 4*sqrt(3)*I*x/3 + 8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + assert asec(x + S(1)/2)._eval_nseries(x, 4, None, -I) == -asec(S(1)/2) + \ + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + assert asec(x - S(1)/2)._eval_nseries(x, 4, None, I) == -asec(-S(1)/2) + \ + 2*pi + 4*sqrt(3)*I*x/3 + 8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + assert asec(x - S(1)/2)._eval_nseries(x, 4, None, -I) == asec(-S(1)/2) - \ + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + # testing nseries for asec at branch points + assert asec(1 + x)._eval_nseries(x, 3, None) == sqrt(2)*sqrt(x) - \ + 5*sqrt(2)*x**(S(3)/2)/12 + 43*sqrt(2)*x**(S(5)/2)/160 + O(x**3) + assert asec(-1 + x)._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(-x) + \ + 5*sqrt(2)*(-x)**(S(3)/2)/12 - 43*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3) + assert asec(exp(x))._eval_nseries(x, 3, None) == sqrt(2)*sqrt(x) - \ + sqrt(2)*x**(S(3)/2)/6 + sqrt(2)*x**(S(5)/2)/120 + O(x**3) + assert asec(-exp(x))._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(x) + \ + sqrt(2)*x**(S(3)/2)/6 - sqrt(2)*x**(S(5)/2)/120 + O(x**3) + + +def test_acsc_nseries(): + assert acsc(x + S(1)/2)._eval_nseries(x, 4, None, I) == acsc(S(1)/2) + \ + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsc(x + S(1)/2)._eval_nseries(x, 4, None, -I) == -acsc(S(1)/2) + \ + pi - 4*sqrt(3)*I*x/3 + 8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsc(x - S(1)/2)._eval_nseries(x, 4, None, I) == acsc(S(1)/2) - pi -\ + 4*sqrt(3)*I*x/3 - 8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4) + assert acsc(x - S(1)/2)._eval_nseries(x, 4, None, -I) == -acsc(S(1)/2) + \ + 4*sqrt(3)*I*x/3 + 8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4) + # testing nseries for acsc at branch points + assert acsc(1 + x)._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(x) + \ + 5*sqrt(2)*x**(S(3)/2)/12 - 43*sqrt(2)*x**(S(5)/2)/160 + O(x**3) + assert acsc(-1 + x)._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(-x) - \ + 5*sqrt(2)*(-x)**(S(3)/2)/12 + 43*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3) + assert acsc(exp(x))._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(x) + \ + sqrt(2)*x**(S(3)/2)/6 - sqrt(2)*x**(S(5)/2)/120 + O(x**3) + assert acsc(-exp(x))._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(x) - \ + sqrt(2)*x**(S(3)/2)/6 + sqrt(2)*x**(S(5)/2)/120 + O(x**3) + + +def test_issue_8653(): + n = Symbol('n', integer=True) + assert sin(n).is_irrational is None + assert cos(n).is_irrational is None + assert tan(n).is_irrational is None + + +def test_issue_9157(): + n = Symbol('n', integer=True, positive=True) + assert atan(n - 1).is_nonnegative is True + + +def test_trig_period(): + x, y = symbols('x, y') + + assert sin(x).period() == 2*pi + assert cos(x).period() == 2*pi + assert tan(x).period() == pi + assert cot(x).period() == pi + assert sec(x).period() == 2*pi + assert csc(x).period() == 2*pi + assert sin(2*x).period() == pi + assert cot(4*x - 6).period() == pi/4 + assert cos((-3)*x).period() == pi*Rational(2, 3) + assert cos(x*y).period(x) == 2*pi/abs(y) + assert sin(3*x*y + 2*pi).period(y) == 2*pi/abs(3*x) + assert tan(3*x).period(y) is S.Zero + raises(NotImplementedError, lambda: sin(x**2).period(x)) + + +def test_issue_7171(): + assert sin(x).rewrite(sqrt) == sin(x) + assert sin(x).rewrite(pow) == sin(x) + + +def test_issue_11864(): + w, k = symbols('w, k', real=True) + F = Piecewise((1, Eq(2*pi*k, 0)), (sin(pi*k)/(pi*k), True)) + soln = Piecewise((1, Eq(2*pi*k, 0)), (sinc(pi*k), True)) + assert F.rewrite(sinc) == soln + +def test_real_assumptions(): + z = Symbol('z', real=False, finite=True) + assert sin(z).is_real is None + assert cos(z).is_real is None + assert tan(z).is_real is False + assert sec(z).is_real is None + assert csc(z).is_real is None + assert cot(z).is_real is False + assert asin(p).is_real is None + assert asin(n).is_real is None + assert asec(p).is_real is None + assert asec(n).is_real is None + assert acos(p).is_real is None + assert acos(n).is_real is None + assert acsc(p).is_real is None + assert acsc(n).is_real is None + assert atan(p).is_positive is True + assert atan(n).is_negative is True + assert acot(p).is_positive is True + assert acot(n).is_negative is True + +def test_issue_14320(): + assert asin(sin(2)) == -2 + pi and (-pi/2 <= -2 + pi <= pi/2) and sin(2) == sin(-2 + pi) + assert asin(cos(2)) == -2 + pi/2 and (-pi/2 <= -2 + pi/2 <= pi/2) and cos(2) == sin(-2 + pi/2) + assert acos(sin(2)) == -pi/2 + 2 and (0 <= -pi/2 + 2 <= pi) and sin(2) == cos(-pi/2 + 2) + assert acos(cos(20)) == -6*pi + 20 and (0 <= -6*pi + 20 <= pi) and cos(20) == cos(-6*pi + 20) + assert acos(cos(30)) == -30 + 10*pi and (0 <= -30 + 10*pi <= pi) and cos(30) == cos(-30 + 10*pi) + + assert atan(tan(17)) == -5*pi + 17 and (-pi/2 < -5*pi + 17 < pi/2) and tan(17) == tan(-5*pi + 17) + assert atan(tan(15)) == -5*pi + 15 and (-pi/2 < -5*pi + 15 < pi/2) and tan(15) == tan(-5*pi + 15) + assert atan(cot(12)) == -12 + pi*Rational(7, 2) and (-pi/2 < -12 + pi*Rational(7, 2) < pi/2) and cot(12) == tan(-12 + pi*Rational(7, 2)) + assert acot(cot(15)) == -5*pi + 15 and (-pi/2 < -5*pi + 15 <= pi/2) and cot(15) == cot(-5*pi + 15) + assert acot(tan(19)) == -19 + pi*Rational(13, 2) and (-pi/2 < -19 + pi*Rational(13, 2) <= pi/2) and tan(19) == cot(-19 + pi*Rational(13, 2)) + + assert asec(sec(11)) == -11 + 4*pi and (0 <= -11 + 4*pi <= pi) and cos(11) == cos(-11 + 4*pi) + assert asec(csc(13)) == -13 + pi*Rational(9, 2) and (0 <= -13 + pi*Rational(9, 2) <= pi) and sin(13) == cos(-13 + pi*Rational(9, 2)) + assert acsc(csc(14)) == -4*pi + 14 and (-pi/2 <= -4*pi + 14 <= pi/2) and sin(14) == sin(-4*pi + 14) + assert acsc(sec(10)) == pi*Rational(-7, 2) + 10 and (-pi/2 <= pi*Rational(-7, 2) + 10 <= pi/2) and cos(10) == sin(pi*Rational(-7, 2) + 10) + +def test_issue_14543(): + assert sec(2*pi + 11) == sec(11) + assert sec(2*pi - 11) == sec(11) + assert sec(pi + 11) == -sec(11) + assert sec(pi - 11) == -sec(11) + + assert csc(2*pi + 17) == csc(17) + assert csc(2*pi - 17) == -csc(17) + assert csc(pi + 17) == -csc(17) + assert csc(pi - 17) == csc(17) + + x = Symbol('x') + assert csc(pi/2 + x) == sec(x) + assert csc(pi/2 - x) == sec(x) + assert csc(pi*Rational(3, 2) + x) == -sec(x) + assert csc(pi*Rational(3, 2) - x) == -sec(x) + + assert sec(pi/2 - x) == csc(x) + assert sec(pi/2 + x) == -csc(x) + assert sec(pi*Rational(3, 2) + x) == csc(x) + assert sec(pi*Rational(3, 2) - x) == -csc(x) + + +def test_as_real_imag(): + # This is for https://github.com/sympy/sympy/issues/17142 + # If it start failing again in irrelevant builds or in the master + # please open up the issue again. + expr = atan(I/(I + I*tan(1))) + assert expr.as_real_imag() == (expr, 0) + + +def test_issue_18746(): + e3 = cos(S.Pi*(x/4 + 1/4)) + assert e3.period() == 8 + + +def test_issue_25833(): + assert limit(atan(x**2), x, oo) == pi/2 + assert limit(atan(x**2 - 1), x, oo) == pi/2 + assert limit(atan(log(2**x)/log(2*x)), x, oo) == pi/2 + + +def test_issue_25847(): + #atan + assert atan(sin(x)/x).as_leading_term(x) == pi/4 + raises(PoleError, lambda: atan(exp(1/x)).as_leading_term(x)) + + #asin + assert asin(sin(x)/x).as_leading_term(x) == pi/2 + raises(PoleError, lambda: asin(exp(1/x)).as_leading_term(x)) + + #acos + assert acos(sin(x)/x).as_leading_term(x) == 0 + raises(PoleError, lambda: acos(exp(1/x)).as_leading_term(x)) + + #acot + assert acot(sin(x)/x).as_leading_term(x) == pi/4 + raises(PoleError, lambda: acot(exp(1/x)).as_leading_term(x)) + + #asec + assert asec(sin(x)/x).as_leading_term(x) == 0 + raises(PoleError, lambda: asec(exp(1/x)).as_leading_term(x)) + + #acsc + assert acsc(sin(x)/x).as_leading_term(x) == pi/2 + raises(PoleError, lambda: acsc(exp(1/x)).as_leading_term(x)) + +def test_issue_23843(): + #atan + assert atan(x + I).series(x, oo) == -16/(5*x**5) - 2*I/x**4 + 4/(3*x**3) + I/x**2 - 1/x + pi/2 + O(x**(-6), (x, oo)) + assert atan(x + I).series(x, -oo) == -16/(5*x**5) - 2*I/x**4 + 4/(3*x**3) + I/x**2 - 1/x - pi/2 + O(x**(-6), (x, -oo)) + assert atan(x - I).series(x, oo) == -16/(5*x**5) + 2*I/x**4 + 4/(3*x**3) - I/x**2 - 1/x + pi/2 + O(x**(-6), (x, oo)) + assert atan(x - I).series(x, -oo) == -16/(5*x**5) + 2*I/x**4 + 4/(3*x**3) - I/x**2 - 1/x - pi/2 + O(x**(-6), (x, -oo)) + + #acot + assert acot(x + I).series(x, oo) == 16/(5*x**5) + 2*I/x**4 - 4/(3*x**3) - I/x**2 + 1/x + O(x**(-6), (x, oo)) + assert acot(x + I).series(x, -oo) == 16/(5*x**5) + 2*I/x**4 - 4/(3*x**3) - I/x**2 + 1/x + O(x**(-6), (x, -oo)) + assert acot(x - I).series(x, oo) == 16/(5*x**5) - 2*I/x**4 - 4/(3*x**3) + I/x**2 + 1/x + O(x**(-6), (x, oo)) + assert acot(x - I).series(x, -oo) == 16/(5*x**5) - 2*I/x**4 - 4/(3*x**3) + I/x**2 + 1/x + O(x**(-6), (x, -oo)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/trigonometric.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/trigonometric.py new file mode 100644 index 0000000000000000000000000000000000000000..24e5db81f17a215f5b344291f0e9bf4752e5317d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/elementary/trigonometric.py @@ -0,0 +1,3627 @@ +from __future__ import annotations +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.expr import Expr +from sympy.core.function import DefinedFunction, ArgumentIndexError, PoleError, expand_mul +from sympy.core.logic import fuzzy_not, fuzzy_or, FuzzyBool, fuzzy_and +from sympy.core.mod import Mod +from sympy.core.numbers import Rational, pi, Integer, Float, equal_valued +from sympy.core.relational import Ne, Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol, Dummy +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial, RisingFactorial +from sympy.functions.combinatorial.numbers import bernoulli, euler +from sympy.functions.elementary.complexes import arg as arg_f, im, re +from sympy.functions.elementary.exponential import log, exp +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt, Min, Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary._trigonometric_special import ( + cos_table, ipartfrac, fermat_coords) +from sympy.logic.boolalg import And +from sympy.ntheory import factorint +from sympy.polys.specialpolys import symmetric_poly +from sympy.utilities.iterables import numbered_symbols + + +############################################################################### +########################## UTILITIES ########################################## +############################################################################### + + +def _imaginary_unit_as_coefficient(arg): + """ Helper to extract symbolic coefficient for imaginary unit """ + if isinstance(arg, Float): + return None + else: + return arg.as_coefficient(S.ImaginaryUnit) + +############################################################################### +########################## TRIGONOMETRIC FUNCTIONS ############################ +############################################################################### + + +class TrigonometricFunction(DefinedFunction): + """Base class for trigonometric functions. """ + + unbranched = True + _singularities = (S.ComplexInfinity,) + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if s.args[0].is_rational and fuzzy_not(s.args[0].is_zero): + return False + else: + return s.is_rational + + def _eval_is_algebraic(self): + s = self.func(*self.args) + if s.func == self.func: + if fuzzy_not(self.args[0].is_zero) and self.args[0].is_algebraic: + return False + pi_coeff = _pi_coeff(self.args[0]) + if pi_coeff is not None and pi_coeff.is_rational: + return True + else: + return s.is_algebraic + + def _eval_expand_complex(self, deep=True, **hints): + re_part, im_part = self.as_real_imag(deep=deep, **hints) + return re_part + im_part*S.ImaginaryUnit + + def _as_real_imag(self, deep=True, **hints): + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.args[0].expand(deep, **hints), S.Zero) + else: + return (self.args[0], S.Zero) + if deep: + re, im = self.args[0].expand(deep, **hints).as_real_imag() + else: + re, im = self.args[0].as_real_imag() + return (re, im) + + def _period(self, general_period, symbol=None): + f = expand_mul(self.args[0]) + if symbol is None: + symbol = tuple(f.free_symbols)[0] + + if not f.has(symbol): + return S.Zero + + if f == symbol: + return general_period + + if symbol in f.free_symbols: + if f.is_Mul: + g, h = f.as_independent(symbol) + if h == symbol: + return general_period/abs(g) + + if f.is_Add: + a, h = f.as_independent(symbol) + g, h = h.as_independent(symbol, as_Add=False) + if h == symbol: + return general_period/abs(g) + + raise NotImplementedError("Use the periodicity function instead.") + + +@cacheit +def _table2(): + # If nested sqrt's are worse than un-evaluation + # you can require q to be in (1, 2, 3, 4, 6, 12) + # q <= 12, q=15, q=20, q=24, q=30, q=40, q=60, q=120 return + # expressions with 2 or fewer sqrt nestings. + return { + 12: (3, 4), + 20: (4, 5), + 30: (5, 6), + 15: (6, 10), + 24: (6, 8), + 40: (8, 10), + 60: (20, 30), + 120: (40, 60) + } + + +def _peeloff_pi(arg): + r""" + Split ARG into two parts, a "rest" and a multiple of $\pi$. + This assumes ARG to be an Add. + The multiple of $\pi$ returned in the second position is always a Rational. + + Examples + ======== + + >>> from sympy.functions.elementary.trigonometric import _peeloff_pi + >>> from sympy import pi + >>> from sympy.abc import x, y + >>> _peeloff_pi(x + pi/2) + (x, 1/2) + >>> _peeloff_pi(x + 2*pi/3 + pi*y) + (x + pi*y + pi/6, 1/2) + + """ + pi_coeff = S.Zero + rest_terms = [] + for a in Add.make_args(arg): + K = a.coeff(pi) + if K and K.is_rational: + pi_coeff += K + else: + rest_terms.append(a) + + if pi_coeff is S.Zero: + return arg, S.Zero + + m1 = (pi_coeff % S.Half) + m2 = pi_coeff - m1 + if m2.is_integer or ((2*m2).is_integer and m2.is_even is False): + return Add(*(rest_terms + [m1*pi])), m2 + return arg, S.Zero + + +def _pi_coeff(arg: Expr, cycles: int = 1) -> Expr | None: + r""" + When arg is a Number times $\pi$ (e.g. $3\pi/2$) then return the Number + normalized to be in the range $[0, 2]$, else `None`. + + When an even multiple of $\pi$ is encountered, if it is multiplying + something with known parity then the multiple is returned as 0 otherwise + as 2. + + Examples + ======== + + >>> from sympy.functions.elementary.trigonometric import _pi_coeff + >>> from sympy import pi, Dummy + >>> from sympy.abc import x + >>> _pi_coeff(3*x*pi) + 3*x + >>> _pi_coeff(11*pi/7) + 11/7 + >>> _pi_coeff(-11*pi/7) + 3/7 + >>> _pi_coeff(4*pi) + 0 + >>> _pi_coeff(5*pi) + 1 + >>> _pi_coeff(5.0*pi) + 1 + >>> _pi_coeff(5.5*pi) + 3/2 + >>> _pi_coeff(2 + pi) + + >>> _pi_coeff(2*Dummy(integer=True)*pi) + 2 + >>> _pi_coeff(2*Dummy(even=True)*pi) + 0 + + """ + if arg is pi: + return S.One + elif not arg: + return S.Zero + elif arg.is_Mul: + cx = arg.coeff(pi) + if cx: + c, x = cx.as_coeff_Mul() # pi is not included as coeff + if c.is_Float: + # recast exact binary fractions to Rationals + f = abs(c) % 1 + if f != 0: + p = -int(round(log(f, 2).evalf())) + m = 2**p + cm = c*m + i = int(cm) + if equal_valued(i, cm): + c = Rational(i, m) + cx = c*x + else: + c = Rational(int(c)) + cx = c*x + if x.is_integer: + c2 = c % 2 + if c2 == 1: + return x + elif not c2: + if x.is_even is not None: # known parity + return S.Zero + return Integer(2) + else: + return c2*x + return cx + elif arg.is_zero: + return S.Zero + return None + + +class sin(TrigonometricFunction): + r""" + The sine function. + + Returns the sine of x (measured in radians). + + Explanation + =========== + + This function will evaluate automatically in the + case $x/\pi$ is some rational number [4]_. For example, + if $x$ is a multiple of $\pi$, $\pi/2$, $\pi/3$, $\pi/4$, and $\pi/6$. + + Examples + ======== + + >>> from sympy import sin, pi + >>> from sympy.abc import x + >>> sin(x**2).diff(x) + 2*x*cos(x**2) + >>> sin(1).diff(x) + 0 + >>> sin(pi) + 0 + >>> sin(pi/2) + 1 + >>> sin(pi/6) + 1/2 + >>> sin(pi/12) + -sqrt(2)/4 + sqrt(6)/4 + + + See Also + ======== + + csc, cos, sec, tan, cot + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Sin + .. [4] https://mathworld.wolfram.com/TrigonometryAngles.html + + """ + + def period(self, symbol=None): + return self._period(2*pi, symbol) + + def fdiff(self, argindex=1): + if argindex == 1: + return cos(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.sets.setexpr import SetExpr + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg.is_zero: + return S.Zero + elif arg in (S.Infinity, S.NegativeInfinity): + return AccumBounds(-1, 1) + + if arg is S.ComplexInfinity: + return S.NaN + + if isinstance(arg, AccumBounds): + from sympy.sets.sets import FiniteSet + min, max = arg.min, arg.max + d = floor(min/(2*pi)) + if min is not S.NegativeInfinity: + min = min - d*2*pi + if max is not S.Infinity: + max = max - d*2*pi + if AccumBounds(min, max).intersection(FiniteSet(pi/2, pi*Rational(5, 2))) \ + is not S.EmptySet and \ + AccumBounds(min, max).intersection(FiniteSet(pi*Rational(3, 2), + pi*Rational(7, 2))) is not S.EmptySet: + return AccumBounds(-1, 1) + elif AccumBounds(min, max).intersection(FiniteSet(pi/2, pi*Rational(5, 2))) \ + is not S.EmptySet: + return AccumBounds(Min(sin(min), sin(max)), 1) + elif AccumBounds(min, max).intersection(FiniteSet(pi*Rational(3, 2), pi*Rational(8, 2))) \ + is not S.EmptySet: + return AccumBounds(-1, Max(sin(min), sin(max))) + else: + return AccumBounds(Min(sin(min), sin(max)), + Max(sin(min), sin(max))) + elif isinstance(arg, SetExpr): + return arg._eval_func(cls) + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import sinh + return S.ImaginaryUnit*sinh(i_coeff) + + pi_coeff = _pi_coeff(arg) + if pi_coeff is not None: + if pi_coeff.is_integer: + return S.Zero + + if (2*pi_coeff).is_integer: + # is_even-case handled above as then pi_coeff.is_integer, + # so check if known to be not even + if pi_coeff.is_even is False: + return S.NegativeOne**(pi_coeff - S.Half) + + if not pi_coeff.is_Rational: + narg = pi_coeff*pi + if narg != arg: + return cls(narg) + return None + + # https://github.com/sympy/sympy/issues/6048 + # transform a sine to a cosine, to avoid redundant code + if pi_coeff.is_Rational: + x = pi_coeff % 2 + if x > 1: + return -cls((x % 1)*pi) + if 2*x > 1: + return cls((1 - x)*pi) + narg = ((pi_coeff + Rational(3, 2)) % 2)*pi + result = cos(narg) + if not isinstance(result, cos): + return result + if pi_coeff*pi != arg: + return cls(pi_coeff*pi) + return None + + if arg.is_Add: + x, m = _peeloff_pi(arg) + if m: + m = m*pi + return sin(m)*cos(x) + cos(m)*sin(x) + + if arg.is_zero: + return S.Zero + + if isinstance(arg, asin): + return arg.args[0] + + if isinstance(arg, atan): + x = arg.args[0] + return x/sqrt(1 + x**2) + + if isinstance(arg, atan2): + y, x = arg.args + return y/sqrt(x**2 + y**2) + + if isinstance(arg, acos): + x = arg.args[0] + return sqrt(1 - x**2) + + if isinstance(arg, acot): + x = arg.args[0] + return 1/(sqrt(1 + 1/x**2)*x) + + if isinstance(arg, acsc): + x = arg.args[0] + return 1/x + + if isinstance(arg, asec): + x = arg.args[0] + return sqrt(1 - 1/x**2) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + if len(previous_terms) > 2: + p = previous_terms[-2] + return -p*x**2/(n*(n - 1)) + else: + return S.NegativeOne**(n//2)*x**n/factorial(n) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.args[0] + if logx is not None: + arg = arg.subs(log(x), logx) + if arg.subs(x, 0).has(S.NaN, S.ComplexInfinity): + raise PoleError("Cannot expand %s around 0" % (self)) + return super()._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + from sympy.functions.elementary.hyperbolic import HyperbolicFunction + I = S.ImaginaryUnit + if isinstance(arg, (TrigonometricFunction, HyperbolicFunction)): + arg = arg.func(arg.args[0]).rewrite(exp) + return (exp(arg*I) - exp(-arg*I))/(2*I) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + if isinstance(arg, log): + I = S.ImaginaryUnit + x = arg.args[0] + return I*x**-I/2 - I*x**I /2 + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return cos(arg - pi/2, evaluate=False) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + tan_half = tan(S.Half*arg) + return 2*tan_half/(1 + tan_half**2) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return sin(arg)*cos(arg)/cos(arg) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + cot_half = cot(S.Half*arg) + return Piecewise((0, And(Eq(im(arg), 0), Eq(Mod(arg, pi), 0))), + (2*cot_half/(1 + cot_half**2), True)) + + def _eval_rewrite_as_pow(self, arg, **kwargs): + return self.rewrite(cos, **kwargs).rewrite(pow, **kwargs) + + def _eval_rewrite_as_sqrt(self, arg, **kwargs): + return self.rewrite(cos, **kwargs).rewrite(sqrt, **kwargs) + + def _eval_rewrite_as_csc(self, arg, **kwargs): + return 1/csc(arg) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + return 1/sec(arg - pi/2, evaluate=False) + + def _eval_rewrite_as_sinc(self, arg, **kwargs): + return arg*sinc(arg) + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return sqrt(pi*arg/2)*besselj(S.Half, arg) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + from sympy.functions.elementary.hyperbolic import cosh, sinh + re, im = self._as_real_imag(deep=deep, **hints) + return (sin(re)*cosh(im), cos(re)*sinh(im)) + + def _eval_expand_trig(self, **hints): + from sympy.functions.special.polynomials import chebyshevt, chebyshevu + arg = self.args[0] + x = None + if arg.is_Add: # TODO, implement more if deep stuff here + # TODO: Do this more efficiently for more than two terms + x, y = arg.as_two_terms() + sx = sin(x, evaluate=False)._eval_expand_trig() + sy = sin(y, evaluate=False)._eval_expand_trig() + cx = cos(x, evaluate=False)._eval_expand_trig() + cy = cos(y, evaluate=False)._eval_expand_trig() + return sx*cy + sy*cx + elif arg.is_Mul: + n, x = arg.as_coeff_Mul(rational=True) + if n.is_Integer: # n will be positive because of .eval + # canonicalization + + # See https://mathworld.wolfram.com/Multiple-AngleFormulas.html + if n.is_odd: + return S.NegativeOne**((n - 1)/2)*chebyshevt(n, sin(x)) + else: + return expand_mul(S.NegativeOne**(n/2 - 1)*cos(x)* + chebyshevu(n - 1, sin(x)), deep=False) + return sin(arg) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = x0/pi + if n.is_integer: + lt = (arg - n*pi).as_leading_term(x) + return (S.NegativeOne**n)*lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in [S.Infinity, S.NegativeInfinity]: + return AccumBounds(-1, 1) + return self.func(x0) if x0.is_finite else self + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + + def _eval_is_finite(self): + arg = self.args[0] + if arg.is_extended_real: + return True + + def _eval_is_zero(self): + rest, pi_mult = _peeloff_pi(self.args[0]) + if rest.is_zero: + return pi_mult.is_integer + + def _eval_is_complex(self): + if self.args[0].is_extended_real \ + or self.args[0].is_complex: + return True + + +class cos(TrigonometricFunction): + """ + The cosine function. + + Returns the cosine of x (measured in radians). + + Explanation + =========== + + See :func:`sin` for notes about automatic evaluation. + + Examples + ======== + + >>> from sympy import cos, pi + >>> from sympy.abc import x + >>> cos(x**2).diff(x) + -2*x*sin(x**2) + >>> cos(1).diff(x) + 0 + >>> cos(pi) + -1 + >>> cos(pi/2) + 0 + >>> cos(2*pi/3) + -1/2 + >>> cos(pi/12) + sqrt(2)/4 + sqrt(6)/4 + + See Also + ======== + + sin, csc, sec, tan, cot + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Cos + + """ + + def period(self, symbol=None): + return self._period(2*pi, symbol) + + def fdiff(self, argindex=1): + if argindex == 1: + return -sin(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + from sympy.functions.special.polynomials import chebyshevt + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.sets.setexpr import SetExpr + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg.is_zero: + return S.One + elif arg in (S.Infinity, S.NegativeInfinity): + # In this case it is better to return AccumBounds(-1, 1) + # rather than returning S.NaN, since AccumBounds(-1, 1) + # preserves the information that sin(oo) is between + # -1 and 1, where S.NaN does not do that. + return AccumBounds(-1, 1) + + if arg is S.ComplexInfinity: + return S.NaN + + if isinstance(arg, AccumBounds): + return sin(arg + pi/2) + elif isinstance(arg, SetExpr): + return arg._eval_func(cls) + + if arg.is_extended_real and arg.is_finite is False: + return AccumBounds(-1, 1) + + if arg.could_extract_minus_sign(): + return cls(-arg) + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import cosh + return cosh(i_coeff) + + pi_coeff = _pi_coeff(arg) + if pi_coeff is not None: + if pi_coeff.is_integer: + return (S.NegativeOne)**pi_coeff + + if (2*pi_coeff).is_integer: + # is_even-case handled above as then pi_coeff.is_integer, + # so check if known to be not even + if pi_coeff.is_even is False: + return S.Zero + + if not pi_coeff.is_Rational: + narg = pi_coeff*pi + if narg != arg: + return cls(narg) + return None + + # cosine formula ##################### + # https://github.com/sympy/sympy/issues/6048 + # explicit calculations are performed for + # cos(k pi/n) for n = 8,10,12,15,20,24,30,40,60,120 + # Some other exact values like cos(k pi/240) can be + # calculated using a partial-fraction decomposition + # by calling cos( X ).rewrite(sqrt) + if pi_coeff.is_Rational: + q = pi_coeff.q + p = pi_coeff.p % (2*q) + if p > q: + narg = (pi_coeff - 1)*pi + return -cls(narg) + if 2*p > q: + narg = (1 - pi_coeff)*pi + return -cls(narg) + + # If nested sqrt's are worse than un-evaluation + # you can require q to be in (1, 2, 3, 4, 6, 12) + # q <= 12, q=15, q=20, q=24, q=30, q=40, q=60, q=120 return + # expressions with 2 or fewer sqrt nestings. + table2 = _table2() + if q in table2: + a, b = table2[q] + a, b = p*pi/a, p*pi/b + nvala, nvalb = cls(a), cls(b) + if None in (nvala, nvalb): + return None + return nvala*nvalb + cls(pi/2 - a)*cls(pi/2 - b) + + if q > 12: + return None + + cst_table_some = { + 3: S.Half, + 5: (sqrt(5) + 1) / 4, + } + if q in cst_table_some: + cts = cst_table_some[pi_coeff.q] + return chebyshevt(pi_coeff.p, cts).expand() + + if 0 == q % 2: + narg = (pi_coeff*2)*pi + nval = cls(narg) + if None == nval: + return None + x = (2*pi_coeff + 1)/2 + sign_cos = (-1)**((-1 if x < 0 else 1)*int(abs(x))) + return sign_cos*sqrt( (1 + nval)/2 ) + return None + + if arg.is_Add: + x, m = _peeloff_pi(arg) + if m: + m = m*pi + return cos(m)*cos(x) - sin(m)*sin(x) + + if arg.is_zero: + return S.One + + if isinstance(arg, acos): + return arg.args[0] + + if isinstance(arg, atan): + x = arg.args[0] + return 1/sqrt(1 + x**2) + + if isinstance(arg, atan2): + y, x = arg.args + return x/sqrt(x**2 + y**2) + + if isinstance(arg, asin): + x = arg.args[0] + return sqrt(1 - x ** 2) + + if isinstance(arg, acot): + x = arg.args[0] + return 1/sqrt(1 + 1/x**2) + + if isinstance(arg, acsc): + x = arg.args[0] + return sqrt(1 - 1/x**2) + + if isinstance(arg, asec): + x = arg.args[0] + return 1/x + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + + if len(previous_terms) > 2: + p = previous_terms[-2] + return -p*x**2/(n*(n - 1)) + else: + return S.NegativeOne**(n//2)*x**n/factorial(n) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.args[0] + if logx is not None: + arg = arg.subs(log(x), logx) + if arg.subs(x, 0).has(S.NaN, S.ComplexInfinity): + raise PoleError("Cannot expand %s around 0" % (self)) + return super()._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + I = S.ImaginaryUnit + from sympy.functions.elementary.hyperbolic import HyperbolicFunction + if isinstance(arg, (TrigonometricFunction, HyperbolicFunction)): + arg = arg.func(arg.args[0]).rewrite(exp, **kwargs) + return (exp(arg*I) + exp(-arg*I))/2 + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + if isinstance(arg, log): + I = S.ImaginaryUnit + x = arg.args[0] + return x**I/2 + x**-I/2 + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return sin(arg + pi/2, evaluate=False) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + tan_half = tan(S.Half*arg)**2 + return (1 - tan_half)/(1 + tan_half) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return sin(arg)*cos(arg)/sin(arg) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + cot_half = cot(S.Half*arg)**2 + return Piecewise((1, And(Eq(im(arg), 0), Eq(Mod(arg, 2*pi), 0))), + ((cot_half - 1)/(cot_half + 1), True)) + + def _eval_rewrite_as_pow(self, arg, **kwargs): + return self._eval_rewrite_as_sqrt(arg, **kwargs) + + def _eval_rewrite_as_sqrt(self, arg: Expr, **kwargs): + from sympy.functions.special.polynomials import chebyshevt + + pi_coeff = _pi_coeff(arg) + if pi_coeff is None: + return None + + if isinstance(pi_coeff, Integer): + return None + + if not isinstance(pi_coeff, Rational): + return None + + cst_table_some = cos_table() + + if pi_coeff.q in cst_table_some: + rv = chebyshevt(pi_coeff.p, cst_table_some[pi_coeff.q]()) + if pi_coeff.q < 257: + rv = rv.expand() + return rv + + if not pi_coeff.q % 2: # recursively remove factors of 2 + pico2 = pi_coeff * 2 + nval = cos(pico2 * pi).rewrite(sqrt, **kwargs) + x = (pico2 + 1) / 2 + sign_cos = -1 if int(x) % 2 else 1 + return sign_cos * sqrt((1 + nval) / 2) + + FC = fermat_coords(pi_coeff.q) + if FC: + denoms = FC + else: + denoms = [b**e for b, e in factorint(pi_coeff.q).items()] + + apart = ipartfrac(*denoms) + decomp = (pi_coeff.p * Rational(n, d) for n, d in zip(apart, denoms)) + X = [(x[1], x[0]*pi) for x in zip(decomp, numbered_symbols('z'))] + pcls = cos(sum(x[0] for x in X))._eval_expand_trig().subs(X) + + if not FC or len(FC) == 1: + return pcls + return pcls.rewrite(sqrt, **kwargs) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + return 1/sec(arg) + + def _eval_rewrite_as_csc(self, arg, **kwargs): + return 1/sec(arg).rewrite(csc, **kwargs) + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return Piecewise( + (sqrt(pi*arg/2)*besselj(-S.Half, arg), Ne(arg, 0)), + (1, True) + ) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + from sympy.functions.elementary.hyperbolic import cosh, sinh + re, im = self._as_real_imag(deep=deep, **hints) + return (cos(re)*cosh(im), -sin(re)*sinh(im)) + + def _eval_expand_trig(self, **hints): + from sympy.functions.special.polynomials import chebyshevt + arg = self.args[0] + x = None + if arg.is_Add: # TODO: Do this more efficiently for more than two terms + x, y = arg.as_two_terms() + sx = sin(x, evaluate=False)._eval_expand_trig() + sy = sin(y, evaluate=False)._eval_expand_trig() + cx = cos(x, evaluate=False)._eval_expand_trig() + cy = cos(y, evaluate=False)._eval_expand_trig() + return cx*cy - sx*sy + elif arg.is_Mul: + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff.is_Integer: + return chebyshevt(coeff, cos(terms)) + return cos(arg) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = (x0 + pi/2)/pi + if n.is_integer: + lt = (arg - n*pi + pi/2).as_leading_term(x) + return (S.NegativeOne**n)*lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in [S.Infinity, S.NegativeInfinity]: + return AccumBounds(-1, 1) + return self.func(x0) if x0.is_finite else self + + def _eval_is_extended_real(self): + if self.args[0].is_extended_real: + return True + + def _eval_is_finite(self): + arg = self.args[0] + + if arg.is_extended_real: + return True + + def _eval_is_complex(self): + if self.args[0].is_extended_real \ + or self.args[0].is_complex: + return True + + def _eval_is_zero(self): + rest, pi_mult = _peeloff_pi(self.args[0]) + if rest.is_zero and pi_mult: + return (pi_mult - S.Half).is_integer + + +class tan(TrigonometricFunction): + """ + The tangent function. + + Returns the tangent of x (measured in radians). + + Explanation + =========== + + See :class:`sin` for notes about automatic evaluation. + + Examples + ======== + + >>> from sympy import tan, pi + >>> from sympy.abc import x + >>> tan(x**2).diff(x) + 2*x*(tan(x**2)**2 + 1) + >>> tan(1).diff(x) + 0 + >>> tan(pi/8).expand() + -1 + sqrt(2) + + See Also + ======== + + sin, csc, cos, sec, cot + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Tan + + """ + + def period(self, symbol=None): + return self._period(pi, symbol) + + def fdiff(self, argindex=1): + if argindex == 1: + return S.One + self**2 + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return atan + + @classmethod + def eval(cls, arg): + from sympy.calculus.accumulationbounds import AccumBounds + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg.is_zero: + return S.Zero + elif arg in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + + if arg is S.ComplexInfinity: + return S.NaN + + if isinstance(arg, AccumBounds): + min, max = arg.min, arg.max + d = floor(min/pi) + if min is not S.NegativeInfinity: + min = min - d*pi + if max is not S.Infinity: + max = max - d*pi + from sympy.sets.sets import FiniteSet + if AccumBounds(min, max).intersection(FiniteSet(pi/2, pi*Rational(3, 2))): + return AccumBounds(S.NegativeInfinity, S.Infinity) + else: + return AccumBounds(tan(min), tan(max)) + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import tanh + return S.ImaginaryUnit*tanh(i_coeff) + + pi_coeff = _pi_coeff(arg, 2) + if pi_coeff is not None: + if pi_coeff.is_integer: + return S.Zero + + if not pi_coeff.is_Rational: + narg = pi_coeff*pi + if narg != arg: + return cls(narg) + return None + + if pi_coeff.is_Rational: + q = pi_coeff.q + p = pi_coeff.p % q + # ensure simplified results are returned for n*pi/5, n*pi/10 + table10 = { + 1: sqrt(1 - 2*sqrt(5)/5), + 2: sqrt(5 - 2*sqrt(5)), + 3: sqrt(1 + 2*sqrt(5)/5), + 4: sqrt(5 + 2*sqrt(5)) + } + if q in (5, 10): + n = 10*p/q + if n > 5: + n = 10 - n + return -table10[n] + else: + return table10[n] + if not pi_coeff.q % 2: + narg = pi_coeff*pi*2 + cresult, sresult = cos(narg), cos(narg - pi/2) + if not isinstance(cresult, cos) \ + and not isinstance(sresult, cos): + if sresult == 0: + return S.ComplexInfinity + return 1/sresult - cresult/sresult + + table2 = _table2() + if q in table2: + a, b = table2[q] + nvala, nvalb = cls(p*pi/a), cls(p*pi/b) + if None in (nvala, nvalb): + return None + return (nvala - nvalb)/(1 + nvala*nvalb) + narg = ((pi_coeff + S.Half) % 1 - S.Half)*pi + # see cos() to specify which expressions should be + # expanded automatically in terms of radicals + cresult, sresult = cos(narg), cos(narg - pi/2) + if not isinstance(cresult, cos) \ + and not isinstance(sresult, cos): + if cresult == 0: + return S.ComplexInfinity + return (sresult/cresult) + if narg != arg: + return cls(narg) + + if arg.is_Add: + x, m = _peeloff_pi(arg) + if m: + tanm = tan(m*pi) + if tanm is S.ComplexInfinity: + return -cot(x) + else: # tanm == 0 + return tan(x) + + if arg.is_zero: + return S.Zero + + if isinstance(arg, atan): + return arg.args[0] + + if isinstance(arg, atan2): + y, x = arg.args + return y/x + + if isinstance(arg, asin): + x = arg.args[0] + return x/sqrt(1 - x**2) + + if isinstance(arg, acos): + x = arg.args[0] + return sqrt(1 - x**2)/x + + if isinstance(arg, acot): + x = arg.args[0] + return 1/x + + if isinstance(arg, acsc): + x = arg.args[0] + return 1/(sqrt(1 - 1/x**2)*x) + + if isinstance(arg, asec): + x = arg.args[0] + return sqrt(1 - 1/x**2)*x + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + a, b = ((n - 1)//2), 2**(n + 1) + + B = bernoulli(n + 1) + F = factorial(n + 1) + + return S.NegativeOne**a*b*(b - 1)*B/F*x**n + + def _eval_nseries(self, x, n, logx, cdir=0): + i = self.args[0].limit(x, 0)*2/pi + if i and i.is_Integer: + return self.rewrite(cos)._eval_nseries(x, n=n, logx=logx) + return super()._eval_nseries(x, n=n, logx=logx) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + if isinstance(arg, log): + I = S.ImaginaryUnit + x = arg.args[0] + return I*(x**-I - x**I)/(x**-I + x**I) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + re, im = self._as_real_imag(deep=deep, **hints) + if im: + from sympy.functions.elementary.hyperbolic import cosh, sinh + denom = cos(2*re) + cosh(2*im) + return (sin(2*re)/denom, sinh(2*im)/denom) + else: + return (self.func(re), S.Zero) + + def _eval_expand_trig(self, **hints): + arg = self.args[0] + x = None + if arg.is_Add: + n = len(arg.args) + TX = [] + for x in arg.args: + tx = tan(x, evaluate=False)._eval_expand_trig() + TX.append(tx) + + Yg = numbered_symbols('Y') + Y = [ next(Yg) for i in range(n) ] + + p = [0, 0] + for i in range(n + 1): + p[1 - i % 2] += symmetric_poly(i, Y)*(-1)**((i % 4)//2) + return (p[0]/p[1]).subs(list(zip(Y, TX))) + + elif arg.is_Mul: + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff.is_Integer and coeff > 1: + I = S.ImaginaryUnit + z = Symbol('dummy', real=True) + P = ((1 + I*z)**coeff).expand() + return (im(P)/re(P)).subs([(z, tan(terms))]) + return tan(arg) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + I = S.ImaginaryUnit + from sympy.functions.elementary.hyperbolic import HyperbolicFunction + if isinstance(arg, (TrigonometricFunction, HyperbolicFunction)): + arg = arg.func(arg.args[0]).rewrite(exp) + neg_exp, pos_exp = exp(-arg*I), exp(arg*I) + return I*(neg_exp - pos_exp)/(neg_exp + pos_exp) + + def _eval_rewrite_as_sin(self, x, **kwargs): + return 2*sin(x)**2/sin(2*x) + + def _eval_rewrite_as_cos(self, x, **kwargs): + return cos(x - pi/2, evaluate=False)/cos(x) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return sin(arg)/cos(arg) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + return 1/cot(arg) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + sin_in_sec_form = sin(arg).rewrite(sec, **kwargs) + cos_in_sec_form = cos(arg).rewrite(sec, **kwargs) + return sin_in_sec_form/cos_in_sec_form + + def _eval_rewrite_as_csc(self, arg, **kwargs): + sin_in_csc_form = sin(arg).rewrite(csc, **kwargs) + cos_in_csc_form = cos(arg).rewrite(csc, **kwargs) + return sin_in_csc_form/cos_in_csc_form + + def _eval_rewrite_as_pow(self, arg, **kwargs): + y = self.rewrite(cos, **kwargs).rewrite(pow, **kwargs) + if y.has(cos): + return None + return y + + def _eval_rewrite_as_sqrt(self, arg, **kwargs): + y = self.rewrite(cos, **kwargs).rewrite(sqrt, **kwargs) + if y.has(cos): + return None + return y + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return besselj(S.Half, arg)/besselj(-S.Half, arg) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.complexes import re + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = 2*x0/pi + if n.is_integer: + lt = (arg - n*pi/2).as_leading_term(x) + return lt if n.is_even else -1/lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + return self.func(x0) if x0.is_finite else self + + def _eval_is_extended_real(self): + # FIXME: currently tan(pi/2) return zoo + return self.args[0].is_extended_real + + def _eval_is_real(self): + arg = self.args[0] + if arg.is_real and (arg/pi - S.Half).is_integer is False: + return True + + def _eval_is_finite(self): + arg = self.args[0] + + if arg.is_real and (arg/pi - S.Half).is_integer is False: + return True + + if arg.is_imaginary: + return True + + def _eval_is_zero(self): + rest, pi_mult = _peeloff_pi(self.args[0]) + if rest.is_zero: + return pi_mult.is_integer + + def _eval_is_complex(self): + arg = self.args[0] + + if arg.is_real and (arg/pi - S.Half).is_integer is False: + return True + + +class cot(TrigonometricFunction): + """ + The cotangent function. + + Returns the cotangent of x (measured in radians). + + Explanation + =========== + + See :class:`sin` for notes about automatic evaluation. + + Examples + ======== + + >>> from sympy import cot, pi + >>> from sympy.abc import x + >>> cot(x**2).diff(x) + 2*x*(-cot(x**2)**2 - 1) + >>> cot(1).diff(x) + 0 + >>> cot(pi/12) + sqrt(3) + 2 + + See Also + ======== + + sin, csc, cos, sec, tan + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Cot + + """ + + def period(self, symbol=None): + return self._period(pi, symbol) + + def fdiff(self, argindex=1): + if argindex == 1: + return S.NegativeOne - self**2 + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return acot + + @classmethod + def eval(cls, arg): + from sympy.calculus.accumulationbounds import AccumBounds + if arg.is_Number: + if arg is S.NaN: + return S.NaN + if arg.is_zero: + return S.ComplexInfinity + elif arg in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + + if arg is S.ComplexInfinity: + return S.NaN + + if isinstance(arg, AccumBounds): + return -tan(arg + pi/2) + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import coth + return -S.ImaginaryUnit*coth(i_coeff) + + pi_coeff = _pi_coeff(arg, 2) + if pi_coeff is not None: + if pi_coeff.is_integer: + return S.ComplexInfinity + + if not pi_coeff.is_Rational: + narg = pi_coeff*pi + if narg != arg: + return cls(narg) + return None + + if pi_coeff.is_Rational: + if pi_coeff.q in (5, 10): + return tan(pi/2 - arg) + if pi_coeff.q > 2 and not pi_coeff.q % 2: + narg = pi_coeff*pi*2 + cresult, sresult = cos(narg), cos(narg - pi/2) + if not isinstance(cresult, cos) \ + and not isinstance(sresult, cos): + return 1/sresult + cresult/sresult + q = pi_coeff.q + p = pi_coeff.p % q + table2 = _table2() + if q in table2: + a, b = table2[q] + nvala, nvalb = cls(p*pi/a), cls(p*pi/b) + if None in (nvala, nvalb): + return None + return (1 + nvala*nvalb)/(nvalb - nvala) + narg = (((pi_coeff + S.Half) % 1) - S.Half)*pi + # see cos() to specify which expressions should be + # expanded automatically in terms of radicals + cresult, sresult = cos(narg), cos(narg - pi/2) + if not isinstance(cresult, cos) \ + and not isinstance(sresult, cos): + if sresult == 0: + return S.ComplexInfinity + return cresult/sresult + if narg != arg: + return cls(narg) + + if arg.is_Add: + x, m = _peeloff_pi(arg) + if m: + cotm = cot(m*pi) + if cotm is S.ComplexInfinity: + return cot(x) + else: # cotm == 0 + return -tan(x) + + if arg.is_zero: + return S.ComplexInfinity + + if isinstance(arg, acot): + return arg.args[0] + + if isinstance(arg, atan): + x = arg.args[0] + return 1/x + + if isinstance(arg, atan2): + y, x = arg.args + return x/y + + if isinstance(arg, asin): + x = arg.args[0] + return sqrt(1 - x**2)/x + + if isinstance(arg, acos): + x = arg.args[0] + return x/sqrt(1 - x**2) + + if isinstance(arg, acsc): + x = arg.args[0] + return sqrt(1 - 1/x**2)*x + + if isinstance(arg, asec): + x = arg.args[0] + return 1/(sqrt(1 - 1/x**2)*x) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return 1/sympify(x) + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + + B = bernoulli(n + 1) + F = factorial(n + 1) + + return S.NegativeOne**((n + 1)//2)*2**(n + 1)*B/F*x**n + + def _eval_nseries(self, x, n, logx, cdir=0): + i = self.args[0].limit(x, 0)/pi + if i and i.is_Integer: + return self.rewrite(cos)._eval_nseries(x, n=n, logx=logx) + return self.rewrite(tan)._eval_nseries(x, n=n, logx=logx) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + re, im = self._as_real_imag(deep=deep, **hints) + if im: + from sympy.functions.elementary.hyperbolic import cosh, sinh + denom = cos(2*re) - cosh(2*im) + return (-sin(2*re)/denom, sinh(2*im)/denom) + else: + return (self.func(re), S.Zero) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + from sympy.functions.elementary.hyperbolic import HyperbolicFunction + I = S.ImaginaryUnit + if isinstance(arg, (TrigonometricFunction, HyperbolicFunction)): + arg = arg.func(arg.args[0]).rewrite(exp, **kwargs) + neg_exp, pos_exp = exp(-arg*I), exp(arg*I) + return I*(pos_exp + neg_exp)/(pos_exp - neg_exp) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + if isinstance(arg, log): + I = S.ImaginaryUnit + x = arg.args[0] + return -I*(x**-I + x**I)/(x**-I - x**I) + + def _eval_rewrite_as_sin(self, x, **kwargs): + return sin(2*x)/(2*(sin(x)**2)) + + def _eval_rewrite_as_cos(self, x, **kwargs): + return cos(x)/cos(x - pi/2, evaluate=False) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return cos(arg)/sin(arg) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + return 1/tan(arg) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + cos_in_sec_form = cos(arg).rewrite(sec, **kwargs) + sin_in_sec_form = sin(arg).rewrite(sec, **kwargs) + return cos_in_sec_form/sin_in_sec_form + + def _eval_rewrite_as_csc(self, arg, **kwargs): + cos_in_csc_form = cos(arg).rewrite(csc, **kwargs) + sin_in_csc_form = sin(arg).rewrite(csc, **kwargs) + return cos_in_csc_form/sin_in_csc_form + + def _eval_rewrite_as_pow(self, arg, **kwargs): + y = self.rewrite(cos, **kwargs).rewrite(pow, **kwargs) + if y.has(cos): + return None + return y + + def _eval_rewrite_as_sqrt(self, arg, **kwargs): + y = self.rewrite(cos, **kwargs).rewrite(sqrt, **kwargs) + if y.has(cos): + return None + return y + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return besselj(-S.Half, arg)/besselj(S.Half, arg) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.complexes import re + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = 2*x0/pi + if n.is_integer: + lt = (arg - n*pi/2).as_leading_term(x) + return 1/lt if n.is_even else -lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + return self.func(x0) if x0.is_finite else self + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + def _eval_expand_trig(self, **hints): + arg = self.args[0] + x = None + if arg.is_Add: + n = len(arg.args) + CX = [] + for x in arg.args: + cx = cot(x, evaluate=False)._eval_expand_trig() + CX.append(cx) + + Yg = numbered_symbols('Y') + Y = [ next(Yg) for i in range(n) ] + + p = [0, 0] + for i in range(n, -1, -1): + p[(n - i) % 2] += symmetric_poly(i, Y)*(-1)**(((n - i) % 4)//2) + return (p[0]/p[1]).subs(list(zip(Y, CX))) + elif arg.is_Mul: + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff.is_Integer and coeff > 1: + I = S.ImaginaryUnit + z = Symbol('dummy', real=True) + P = ((z + I)**coeff).expand() + return (re(P)/im(P)).subs([(z, cot(terms))]) + return cot(arg) # XXX sec and csc return 1/cos and 1/sin + + def _eval_is_finite(self): + arg = self.args[0] + if arg.is_real and (arg/pi).is_integer is False: + return True + if arg.is_imaginary: + return True + + def _eval_is_real(self): + arg = self.args[0] + if arg.is_real and (arg/pi).is_integer is False: + return True + + def _eval_is_complex(self): + arg = self.args[0] + if arg.is_real and (arg/pi).is_integer is False: + return True + + def _eval_is_zero(self): + rest, pimult = _peeloff_pi(self.args[0]) + if pimult and rest.is_zero: + return (pimult - S.Half).is_integer + + def _eval_subs(self, old, new): + arg = self.args[0] + argnew = arg.subs(old, new) + if arg != argnew and (argnew/pi).is_integer: + return S.ComplexInfinity + return cot(argnew) + + +class ReciprocalTrigonometricFunction(TrigonometricFunction): + """Base class for reciprocal functions of trigonometric functions. """ + + _reciprocal_of = None # mandatory, to be defined in subclass + _singularities = (S.ComplexInfinity,) + + # _is_even and _is_odd are used for correct evaluation of csc(-x), sec(-x) + # TODO refactor into TrigonometricFunction common parts of + # trigonometric functions eval() like even/odd, func(x+2*k*pi), etc. + + # optional, to be defined in subclasses: + _is_even: FuzzyBool = None + _is_odd: FuzzyBool = None + + @classmethod + def eval(cls, arg): + if arg.could_extract_minus_sign(): + if cls._is_even: + return cls(-arg) + if cls._is_odd: + return -cls(-arg) + + pi_coeff = _pi_coeff(arg) + if (pi_coeff is not None + and not (2*pi_coeff).is_integer + and pi_coeff.is_Rational): + q = pi_coeff.q + p = pi_coeff.p % (2*q) + if p > q: + narg = (pi_coeff - 1)*pi + return -cls(narg) + if 2*p > q: + narg = (1 - pi_coeff)*pi + if cls._is_odd: + return cls(narg) + elif cls._is_even: + return -cls(narg) + + if hasattr(arg, 'inverse') and arg.inverse() == cls: + return arg.args[0] + + t = cls._reciprocal_of.eval(arg) + if t is None: + return t + elif any(isinstance(i, cos) for i in (t, -t)): + return (1/t).rewrite(sec) + elif any(isinstance(i, sin) for i in (t, -t)): + return (1/t).rewrite(csc) + else: + return 1/t + + def _call_reciprocal(self, method_name, *args, **kwargs): + # Calls method_name on _reciprocal_of + o = self._reciprocal_of(self.args[0]) + return getattr(o, method_name)(*args, **kwargs) + + def _calculate_reciprocal(self, method_name, *args, **kwargs): + # If calling method_name on _reciprocal_of returns a value != None + # then return the reciprocal of that value + t = self._call_reciprocal(method_name, *args, **kwargs) + return 1/t if t is not None else t + + def _rewrite_reciprocal(self, method_name, arg): + # Special handling for rewrite functions. If reciprocal rewrite returns + # unmodified expression, then return None + t = self._call_reciprocal(method_name, arg) + if t is not None and t != self._reciprocal_of(arg): + return 1/t + + def _period(self, symbol): + f = expand_mul(self.args[0]) + return self._reciprocal_of(f).period(symbol) + + def fdiff(self, argindex=1): + return -self._calculate_reciprocal("fdiff", argindex)/self**2 + + def _eval_rewrite_as_exp(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_exp", arg) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_Pow", arg) + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_sin", arg) + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_cos", arg) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_tan", arg) + + def _eval_rewrite_as_pow(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_pow", arg) + + def _eval_rewrite_as_sqrt(self, arg, **kwargs): + return self._rewrite_reciprocal("_eval_rewrite_as_sqrt", arg) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def as_real_imag(self, deep=True, **hints): + return (1/self._reciprocal_of(self.args[0])).as_real_imag(deep, + **hints) + + def _eval_expand_trig(self, **hints): + return self._calculate_reciprocal("_eval_expand_trig", **hints) + + def _eval_is_extended_real(self): + return self._reciprocal_of(self.args[0])._eval_is_extended_real() + + def _eval_as_leading_term(self, x, logx, cdir): + return (1/self._reciprocal_of(self.args[0]))._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_is_finite(self): + return (1/self._reciprocal_of(self.args[0])).is_finite + + def _eval_nseries(self, x, n, logx, cdir=0): + return (1/self._reciprocal_of(self.args[0]))._eval_nseries(x, n, logx) + + +class sec(ReciprocalTrigonometricFunction): + """ + The secant function. + + Returns the secant of x (measured in radians). + + Explanation + =========== + + See :class:`sin` for notes about automatic evaluation. + + Examples + ======== + + >>> from sympy import sec + >>> from sympy.abc import x + >>> sec(x**2).diff(x) + 2*x*tan(x**2)*sec(x**2) + >>> sec(1).diff(x) + 0 + + See Also + ======== + + sin, csc, cos, tan, cot + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Sec + + """ + + _reciprocal_of = cos + _is_even = True + + def period(self, symbol=None): + return self._period(symbol) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + cot_half_sq = cot(arg/2)**2 + return (cot_half_sq + 1)/(cot_half_sq - 1) + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return (1/cos(arg)) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return sin(arg)/(cos(arg)*sin(arg)) + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return (1/cos(arg).rewrite(sin, **kwargs)) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + return (1/cos(arg).rewrite(tan, **kwargs)) + + def _eval_rewrite_as_csc(self, arg, **kwargs): + return csc(pi/2 - arg, evaluate=False) + + def fdiff(self, argindex=1): + if argindex == 1: + return tan(self.args[0])*sec(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return Piecewise( + (1/(sqrt(pi*arg)/(sqrt(2))*besselj(-S.Half, arg)), Ne(arg, 0)), + (1, True) + ) + + def _eval_is_complex(self): + arg = self.args[0] + + if arg.is_complex and (arg/pi - S.Half).is_integer is False: + return True + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + # Reference Formula: + # https://functions.wolfram.com/ElementaryFunctions/Sec/06/01/02/01/ + if n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + k = n//2 + return S.NegativeOne**k*euler(2*k)/factorial(2*k)*x**(2*k) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.complexes import re + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = (x0 + pi/2)/pi + if n.is_integer: + lt = (arg - n*pi + pi/2).as_leading_term(x) + return (S.NegativeOne**n)/lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + return self.func(x0) if x0.is_finite else self + + +class csc(ReciprocalTrigonometricFunction): + """ + The cosecant function. + + Returns the cosecant of x (measured in radians). + + Explanation + =========== + + See :func:`sin` for notes about automatic evaluation. + + Examples + ======== + + >>> from sympy import csc + >>> from sympy.abc import x + >>> csc(x**2).diff(x) + -2*x*cot(x**2)*csc(x**2) + >>> csc(1).diff(x) + 0 + + See Also + ======== + + sin, cos, sec, tan, cot + asin, acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_functions + .. [2] https://dlmf.nist.gov/4.14 + .. [3] https://functions.wolfram.com/ElementaryFunctions/Csc + + """ + + _reciprocal_of = sin + _is_odd = True + + def period(self, symbol=None): + return self._period(symbol) + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return (1/sin(arg)) + + def _eval_rewrite_as_sincos(self, arg, **kwargs): + return cos(arg)/(sin(arg)*cos(arg)) + + def _eval_rewrite_as_cot(self, arg, **kwargs): + cot_half = cot(arg/2) + return (1 + cot_half**2)/(2*cot_half) + + def _eval_rewrite_as_cos(self, arg, **kwargs): + return 1/sin(arg).rewrite(cos, **kwargs) + + def _eval_rewrite_as_sec(self, arg, **kwargs): + return sec(pi/2 - arg, evaluate=False) + + def _eval_rewrite_as_tan(self, arg, **kwargs): + return (1/sin(arg).rewrite(tan, **kwargs)) + + def _eval_rewrite_as_besselj(self, arg, **kwargs): + from sympy.functions.special.bessel import besselj + return sqrt(2/pi)*(1/(sqrt(arg)*besselj(S.Half, arg))) + + def fdiff(self, argindex=1): + if argindex == 1: + return -cot(self.args[0])*csc(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_complex(self): + arg = self.args[0] + if arg.is_real and (arg/pi).is_integer is False: + return True + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return 1/sympify(x) + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + k = n//2 + 1 + return (S.NegativeOne**(k - 1)*2*(2**(2*k - 1) - 1)* + bernoulli(2*k)*x**(2*k - 1)/factorial(2*k)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.complexes import re + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + n = x0/pi + if n.is_integer: + lt = (arg - n*pi).as_leading_term(x) + return (S.NegativeOne**n)/lt + if x0 is S.ComplexInfinity: + x0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if x0 in (S.Infinity, S.NegativeInfinity): + return AccumBounds(S.NegativeInfinity, S.Infinity) + return self.func(x0) if x0.is_finite else self + + +class sinc(DefinedFunction): + r""" + Represents an unnormalized sinc function: + + .. math:: + + \operatorname{sinc}(x) = + \begin{cases} + \frac{\sin x}{x} & \qquad x \neq 0 \\ + 1 & \qquad x = 0 + \end{cases} + + Examples + ======== + + >>> from sympy import sinc, oo, jn + >>> from sympy.abc import x + >>> sinc(x) + sinc(x) + + * Automated Evaluation + + >>> sinc(0) + 1 + >>> sinc(oo) + 0 + + * Differentiation + + >>> sinc(x).diff() + cos(x)/x - sin(x)/x**2 + + * Series Expansion + + >>> sinc(x).series() + 1 - x**2/6 + x**4/120 + O(x**6) + + * As zero'th order spherical Bessel Function + + >>> sinc(x).rewrite(jn) + jn(0, x) + + See also + ======== + + sin + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Sinc_function + + """ + _singularities = (S.ComplexInfinity,) + + def fdiff(self, argindex=1): + x = self.args[0] + if argindex == 1: + # We would like to return the Piecewise here, but Piecewise.diff + # currently can't handle removable singularities, meaning things + # like sinc(x).diff(x, 2) give the wrong answer at x = 0. See + # https://github.com/sympy/sympy/issues/11402. + # + # return Piecewise(((x*cos(x) - sin(x))/x**2, Ne(x, S.Zero)), (S.Zero, S.true)) + return cos(x)/x - sin(x)/x**2 + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, arg): + if arg.is_zero: + return S.One + if arg.is_Number: + if arg in [S.Infinity, S.NegativeInfinity]: + return S.Zero + elif arg is S.NaN: + return S.NaN + + if arg is S.ComplexInfinity: + return S.NaN + + if arg.could_extract_minus_sign(): + return cls(-arg) + + pi_coeff = _pi_coeff(arg) + if pi_coeff is not None: + if pi_coeff.is_integer: + if fuzzy_not(arg.is_zero): + return S.Zero + elif (2*pi_coeff).is_integer: + return S.NegativeOne**(pi_coeff - S.Half)/arg + + def _eval_nseries(self, x, n, logx, cdir=0): + x = self.args[0] + return (sin(x)/x)._eval_nseries(x, n, logx) + + def _eval_rewrite_as_jn(self, arg, **kwargs): + from sympy.functions.special.bessel import jn + return jn(0, arg) + + def _eval_rewrite_as_sin(self, arg, **kwargs): + return Piecewise((sin(arg)/arg, Ne(arg, S.Zero)), (S.One, S.true)) + + def _eval_is_zero(self): + if self.args[0].is_infinite: + return True + rest, pi_mult = _peeloff_pi(self.args[0]) + if rest.is_zero: + return fuzzy_and([pi_mult.is_integer, pi_mult.is_nonzero]) + if rest.is_Number and pi_mult.is_integer: + return False + + def _eval_is_real(self): + if self.args[0].is_extended_real or self.args[0].is_imaginary: + return True + + _eval_is_finite = _eval_is_real + + +############################################################################### +########################### TRIGONOMETRIC INVERSES ############################ +############################################################################### + + +class InverseTrigonometricFunction(DefinedFunction): + """Base class for inverse trigonometric functions.""" + _singularities: tuple[Expr, ...] = (S.One, S.NegativeOne, S.Zero, S.ComplexInfinity) + + @staticmethod + @cacheit + def _asin_table(): + # Only keys with could_extract_minus_sign() == False + # are actually needed. + return { + sqrt(3)/2: pi/3, + sqrt(2)/2: pi/4, + 1/sqrt(2): pi/4, + sqrt((5 - sqrt(5))/8): pi/5, + sqrt(2)*sqrt(5 - sqrt(5))/4: pi/5, + sqrt((5 + sqrt(5))/8): pi*Rational(2, 5), + sqrt(2)*sqrt(5 + sqrt(5))/4: pi*Rational(2, 5), + S.Half: pi/6, + sqrt(2 - sqrt(2))/2: pi/8, + sqrt(S.Half - sqrt(2)/4): pi/8, + sqrt(2 + sqrt(2))/2: pi*Rational(3, 8), + sqrt(S.Half + sqrt(2)/4): pi*Rational(3, 8), + (sqrt(5) - 1)/4: pi/10, + (1 - sqrt(5))/4: -pi/10, + (sqrt(5) + 1)/4: pi*Rational(3, 10), + sqrt(6)/4 - sqrt(2)/4: pi/12, + -sqrt(6)/4 + sqrt(2)/4: -pi/12, + (sqrt(3) - 1)/sqrt(8): pi/12, + (1 - sqrt(3))/sqrt(8): -pi/12, + sqrt(6)/4 + sqrt(2)/4: pi*Rational(5, 12), + (1 + sqrt(3))/sqrt(8): pi*Rational(5, 12) + } + + + @staticmethod + @cacheit + def _atan_table(): + # Only keys with could_extract_minus_sign() == False + # are actually needed. + return { + sqrt(3)/3: pi/6, + 1/sqrt(3): pi/6, + sqrt(3): pi/3, + sqrt(2) - 1: pi/8, + 1 - sqrt(2): -pi/8, + 1 + sqrt(2): pi*Rational(3, 8), + sqrt(5 - 2*sqrt(5)): pi/5, + sqrt(5 + 2*sqrt(5)): pi*Rational(2, 5), + sqrt(1 - 2*sqrt(5)/5): pi/10, + sqrt(1 + 2*sqrt(5)/5): pi*Rational(3, 10), + 2 - sqrt(3): pi/12, + -2 + sqrt(3): -pi/12, + 2 + sqrt(3): pi*Rational(5, 12) + } + + @staticmethod + @cacheit + def _acsc_table(): + # Keys for which could_extract_minus_sign() + # will obviously return True are omitted. + return { + 2*sqrt(3)/3: pi/3, + sqrt(2): pi/4, + sqrt(2 + 2*sqrt(5)/5): pi/5, + 1/sqrt(Rational(5, 8) - sqrt(5)/8): pi/5, + sqrt(2 - 2*sqrt(5)/5): pi*Rational(2, 5), + 1/sqrt(Rational(5, 8) + sqrt(5)/8): pi*Rational(2, 5), + 2: pi/6, + sqrt(4 + 2*sqrt(2)): pi/8, + 2/sqrt(2 - sqrt(2)): pi/8, + sqrt(4 - 2*sqrt(2)): pi*Rational(3, 8), + 2/sqrt(2 + sqrt(2)): pi*Rational(3, 8), + 1 + sqrt(5): pi/10, + sqrt(5) - 1: pi*Rational(3, 10), + -(sqrt(5) - 1): pi*Rational(-3, 10), + sqrt(6) + sqrt(2): pi/12, + sqrt(6) - sqrt(2): pi*Rational(5, 12), + -(sqrt(6) - sqrt(2)): pi*Rational(-5, 12) + } + + +class asin(InverseTrigonometricFunction): + r""" + The inverse sine function. + + Returns the arcsine of x in radians. + + Explanation + =========== + + ``asin(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, 0, 1, -1\}$ and for some instances when the + result is a rational multiple of $\pi$ (see the ``eval`` class method). + + A purely imaginary argument will lead to an asinh expression. + + Examples + ======== + + >>> from sympy import asin, oo + >>> asin(1) + pi/2 + >>> asin(-1) + -pi/2 + >>> asin(-oo) + oo*I + >>> asin(oo) + -oo*I + + See Also + ======== + + sin, csc, cos, sec, tan, cot + acsc, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://dlmf.nist.gov/4.23 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcSin + + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/sqrt(1 - self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if s.args[0].is_rational: + return False + else: + return s.is_rational + + def _eval_is_positive(self): + return self._eval_is_extended_real() and self.args[0].is_positive + + def _eval_is_negative(self): + return self._eval_is_extended_real() and self.args[0].is_negative + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.NegativeInfinity*S.ImaginaryUnit + elif arg is S.NegativeInfinity: + return S.Infinity*S.ImaginaryUnit + elif arg.is_zero: + return S.Zero + elif arg is S.One: + return pi/2 + elif arg is S.NegativeOne: + return -pi/2 + + if arg is S.ComplexInfinity: + return S.ComplexInfinity + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_number: + asin_table = cls._asin_table() + if arg in asin_table: + return asin_table[arg] + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import asinh + return S.ImaginaryUnit*asinh(i_coeff) + + if arg.is_zero: + return S.Zero + + if isinstance(arg, sin): + ang = arg.args[0] + if ang.is_comparable: + ang %= 2*pi # restrict to [0,2*pi) + if ang > pi: # restrict to (-pi,pi] + ang = pi - ang + + # restrict to [-pi/2,pi/2] + if ang > pi/2: + ang = pi - ang + if ang < -pi/2: + ang = -pi - ang + + return ang + + if isinstance(arg, cos): # acos(x) + asin(x) = pi/2 + ang = arg.args[0] + if ang.is_comparable: + return pi/2 - acos(arg) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) >= 2 and n > 2: + p = previous_terms[-2] + return p*(n - 2)**2/(n*(n - 1))*x**2 + else: + k = (n - 1) // 2 + R = RisingFactorial(S.Half, k) + F = factorial(k) + return R/F*x**n/n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + if x0.is_zero: + return arg.as_leading_term(x) + + # Handling branch points + if x0 in (-S.One, S.One, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + # Handling points lying on branch cuts (-oo, -1) U (1, oo) + if (1 - x0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_negative: + return -pi - self.func(x0) + elif im(ndir).is_positive: + if x0.is_positive: + return pi - self.func(x0) + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # asin + from sympy.series.order import O + arg0 = self.args[0].subs(x, 0) + # Handling branch points + if arg0 is S.One: + t = Dummy('t', positive=True) + ser = asin(S.One - t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One - self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else pi/2 + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + if arg0 is S.NegativeOne: + t = Dummy('t', positive=True) + ser = asin(S.NegativeOne + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else -pi/2 + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + # Handling points lying on branch cuts (-oo, -1) U (1, oo) + if (1 - arg0**2).is_negative: + ndir = self.args[0].dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_negative: + return -pi - res + elif im(ndir).is_positive: + if arg0.is_positive: + return pi - res + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_acos(self, x, **kwargs): + return pi/2 - acos(x) + + def _eval_rewrite_as_atan(self, x, **kwargs): + return 2*atan(x/(1 + sqrt(1 - x**2))) + + def _eval_rewrite_as_log(self, x, **kwargs): + return -S.ImaginaryUnit*log(S.ImaginaryUnit*x + sqrt(1 - x**2)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_acot(self, arg, **kwargs): + return 2*acot((1 + sqrt(1 - arg**2))/arg) + + def _eval_rewrite_as_asec(self, arg, **kwargs): + return pi/2 - asec(1/arg) + + def _eval_rewrite_as_acsc(self, arg, **kwargs): + return acsc(1/arg) + + def _eval_is_extended_real(self): + x = self.args[0] + return x.is_extended_real and (1 - abs(x)).is_nonnegative + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return sin + + +class acos(InverseTrigonometricFunction): + r""" + The inverse cosine function. + + Explanation + =========== + + Returns the arc cosine of x (measured in radians). + + ``acos(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, 0, 1, -1\}$ and for some instances when + the result is a rational multiple of $\pi$ (see the eval class method). + + ``acos(zoo)`` evaluates to ``zoo`` + (see note in :class:`sympy.functions.elementary.trigonometric.asec`) + + A purely imaginary argument will be rewritten to asinh. + + Examples + ======== + + >>> from sympy import acos, oo + >>> acos(1) + 0 + >>> acos(0) + pi/2 + >>> acos(oo) + oo*I + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acsc, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://dlmf.nist.gov/4.23 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcCos + + """ + + def fdiff(self, argindex=1): + if argindex == 1: + return -1/sqrt(1 - self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if s.args[0].is_rational: + return False + else: + return s.is_rational + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity*S.ImaginaryUnit + elif arg is S.NegativeInfinity: + return S.NegativeInfinity*S.ImaginaryUnit + elif arg.is_zero: + return pi/2 + elif arg is S.One: + return S.Zero + elif arg is S.NegativeOne: + return pi + + if arg is S.ComplexInfinity: + return S.ComplexInfinity + + if arg.is_number: + asin_table = cls._asin_table() + if arg in asin_table: + return pi/2 - asin_table[arg] + elif -arg in asin_table: + return pi/2 + asin_table[-arg] + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + return pi/2 - asin(arg) + + if arg.is_Mul and len(arg.args) == 2 and arg.args[0] == -1: + narg = arg.args[1] + minus = True + else: + narg = arg + minus = False + + if isinstance(narg, cos): + # acos(cos(x)) = x or acos(-cos(x)) = pi - x + ang = narg.args[0] + if ang.is_comparable: + if minus: + ang = pi - ang + ang %= 2*pi # restrict to [0,2*pi) + if ang > pi: # restrict to [0,pi] + ang = 2*pi - ang + return ang + + if isinstance(narg, sin): # acos(x) + asin(x) = pi/2 + ang = narg.args[0] + if ang.is_comparable: + if minus: + return pi/2 + asin(narg) + return pi/2 - asin(narg) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return pi/2 + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) >= 2 and n > 2: + p = previous_terms[-2] + return p*(n - 2)**2/(n*(n - 1))*x**2 + else: + k = (n - 1) // 2 + R = RisingFactorial(S.Half, k) + F = factorial(k) + return -R/F*x**n/n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + # Handling branch points + if x0 == 1: + return sqrt(2)*sqrt((S.One - arg).as_leading_term(x)) + if x0 in (-S.One, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + # Handling points lying on branch cuts (-oo, -1) U (1, oo) + if (1 - x0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_negative: + return 2*pi - self.func(x0) + elif im(ndir).is_positive: + if x0.is_positive: + return -self.func(x0) + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_is_extended_real(self): + x = self.args[0] + return x.is_extended_real and (1 - abs(x)).is_nonnegative + + def _eval_is_nonnegative(self): + return self._eval_is_extended_real() + + def _eval_nseries(self, x, n, logx, cdir=0): # acos + from sympy.series.order import O + arg0 = self.args[0].subs(x, 0) + # Handling branch points + if arg0 is S.One: + t = Dummy('t', positive=True) + ser = acos(S.One - t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One - self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + if arg0 is S.NegativeOne: + t = Dummy('t', positive=True) + ser = acos(S.NegativeOne + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.One + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + if not g.is_meromorphic(x, 0): # cannot be expanded + return O(1) if n == 0 else pi + O(sqrt(x)) + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + # Handling points lying on branch cuts (-oo, -1) U (1, oo) + if (1 - arg0**2).is_negative: + ndir = self.args[0].dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_negative: + return 2*pi - res + elif im(ndir).is_positive: + if arg0.is_positive: + return -res + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return pi/2 + S.ImaginaryUnit*\ + log(S.ImaginaryUnit*x + sqrt(1 - x**2)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_asin(self, x, **kwargs): + return pi/2 - asin(x) + + def _eval_rewrite_as_atan(self, x, **kwargs): + return atan(sqrt(1 - x**2)/x) + (pi/2)*(1 - x*sqrt(1/x**2)) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return cos + + def _eval_rewrite_as_acot(self, arg, **kwargs): + return pi/2 - 2*acot((1 + sqrt(1 - arg**2))/arg) + + def _eval_rewrite_as_asec(self, arg, **kwargs): + return asec(1/arg) + + def _eval_rewrite_as_acsc(self, arg, **kwargs): + return pi/2 - acsc(1/arg) + + def _eval_conjugate(self): + z = self.args[0] + r = self.func(self.args[0].conjugate()) + if z.is_extended_real is False: + return r + elif z.is_extended_real and (z + 1).is_nonnegative and (z - 1).is_nonpositive: + return r + + +class atan(InverseTrigonometricFunction): + r""" + The inverse tangent function. + + Returns the arc tangent of x (measured in radians). + + Explanation + =========== + + ``atan(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, 0, 1, -1\}$ and for some instances when the + result is a rational multiple of $\pi$ (see the eval class method). + + Examples + ======== + + >>> from sympy import atan, oo + >>> atan(0) + 0 + >>> atan(1) + pi/4 + >>> atan(oo) + pi/2 + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acsc, acos, asec, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://dlmf.nist.gov/4.23 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcTan + + """ + + args: tuple[Expr] + + _singularities = (S.ImaginaryUnit, -S.ImaginaryUnit) + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/(1 + self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if s.args[0].is_rational: + return False + else: + return s.is_rational + + def _eval_is_positive(self): + return self.args[0].is_extended_positive + + def _eval_is_nonnegative(self): + return self.args[0].is_extended_nonnegative + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_is_real(self): + return self.args[0].is_extended_real + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return pi/2 + elif arg is S.NegativeInfinity: + return -pi/2 + elif arg.is_zero: + return S.Zero + elif arg is S.One: + return pi/4 + elif arg is S.NegativeOne: + return -pi/4 + + if arg is S.ComplexInfinity: + from sympy.calculus.accumulationbounds import AccumBounds + return AccumBounds(-pi/2, pi/2) + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_number: + atan_table = cls._atan_table() + if arg in atan_table: + return atan_table[arg] + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import atanh + return S.ImaginaryUnit*atanh(i_coeff) + + if arg.is_zero: + return S.Zero + + if isinstance(arg, tan): + ang = arg.args[0] + if ang.is_comparable: + ang %= pi # restrict to [0,pi) + if ang > pi/2: # restrict to [-pi/2,pi/2] + ang -= pi + + return ang + + if isinstance(arg, cot): # atan(x) + acot(x) = pi/2 + ang = arg.args[0] + if ang.is_comparable: + ang = pi/2 - acot(arg) + if ang > pi/2: # restrict to [-pi/2,pi/2] + ang -= pi + return ang + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + return S.NegativeOne**((n - 1)//2)*x**n/n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + if x0.is_zero: + return arg.as_leading_term(x) + # Handling branch points + if x0 in (-S.ImaginaryUnit, S.ImaginaryUnit, S.ComplexInfinity): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + # Handling points lying on branch cuts (-I*oo, -I) U (I, I*oo) + if (1 + x0**2).is_negative: + ndir = arg.dir(x, cdir if cdir else 1) + if re(ndir).is_negative: + if im(x0).is_positive: + return self.func(x0) - pi + elif re(ndir).is_positive: + if im(x0).is_negative: + return self.func(x0) + pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # atan + arg0 = self.args[0].subs(x, 0) + + # Handling branch points + if arg0 in (S.ImaginaryUnit, S.NegativeOne*S.ImaginaryUnit): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + ndir = self.args[0].dir(x, cdir if cdir else 1) + if arg0 is S.ComplexInfinity: + if re(ndir) > 0: + return res - pi + return res + # Handling points lying on branch cuts (-I*oo, -I) U (I, I*oo) + if (1 + arg0**2).is_negative: + if re(ndir).is_negative: + if im(arg0).is_positive: + return res - pi + elif re(ndir).is_positive: + if im(arg0).is_negative: + return res + pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, x, **kwargs): + return S.ImaginaryUnit/2*(log(S.One - S.ImaginaryUnit*x) + - log(S.One + S.ImaginaryUnit*x)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_aseries(self, n, args0, x, logx): + if args0[0] in [S.Infinity, S.NegativeInfinity]: + return (pi/2 - atan(1/self.args[0]))._eval_nseries(x, n, logx) + else: + return super()._eval_aseries(n, args0, x, logx) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return tan + + def _eval_rewrite_as_asin(self, arg, **kwargs): + return sqrt(arg**2)/arg*(pi/2 - asin(1/sqrt(1 + arg**2))) + + def _eval_rewrite_as_acos(self, arg, **kwargs): + return sqrt(arg**2)/arg*acos(1/sqrt(1 + arg**2)) + + def _eval_rewrite_as_acot(self, arg, **kwargs): + return acot(1/arg) + + def _eval_rewrite_as_asec(self, arg, **kwargs): + return sqrt(arg**2)/arg*asec(sqrt(1 + arg**2)) + + def _eval_rewrite_as_acsc(self, arg, **kwargs): + return sqrt(arg**2)/arg*(pi/2 - acsc(sqrt(1 + arg**2))) + + +class acot(InverseTrigonometricFunction): + r""" + The inverse cotangent function. + + Returns the arc cotangent of x (measured in radians). + + Explanation + =========== + + ``acot(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, \tilde{\infty}, 0, 1, -1\}$ + and for some instances when the result is a rational multiple of $\pi$ + (see the eval class method). + + A purely imaginary argument will lead to an ``acoth`` expression. + + ``acot(x)`` has a branch cut along $(-i, i)$, hence it is discontinuous + at 0. Its range for real $x$ is $(-\frac{\pi}{2}, \frac{\pi}{2}]$. + + Examples + ======== + + >>> from sympy import acot, sqrt + >>> acot(0) + pi/2 + >>> acot(1) + pi/4 + >>> acot(sqrt(3) - 2) + -5*pi/12 + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acsc, acos, asec, atan, atan2 + + References + ========== + + .. [1] https://dlmf.nist.gov/4.23 + .. [2] https://functions.wolfram.com/ElementaryFunctions/ArcCot + + """ + _singularities = (S.ImaginaryUnit, -S.ImaginaryUnit) + + def fdiff(self, argindex=1): + if argindex == 1: + return -1/(1 + self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_rational(self): + s = self.func(*self.args) + if s.func == self.func: + if s.args[0].is_rational: + return False + else: + return s.is_rational + + def _eval_is_positive(self): + return self.args[0].is_nonnegative + + def _eval_is_negative(self): + return self.args[0].is_negative + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return pi/ 2 + elif arg is S.One: + return pi/4 + elif arg is S.NegativeOne: + return -pi/4 + + if arg is S.ComplexInfinity: + return S.Zero + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_number: + atan_table = cls._atan_table() + if arg in atan_table: + ang = pi/2 - atan_table[arg] + if ang > pi/2: # restrict to (-pi/2,pi/2] + ang -= pi + return ang + + i_coeff = _imaginary_unit_as_coefficient(arg) + if i_coeff is not None: + from sympy.functions.elementary.hyperbolic import acoth + return -S.ImaginaryUnit*acoth(i_coeff) + + if arg.is_zero: + return pi*S.Half + + if isinstance(arg, cot): + ang = arg.args[0] + if ang.is_comparable: + ang %= pi # restrict to [0,pi) + if ang > pi/2: # restrict to (-pi/2,pi/2] + ang -= pi + return ang + + if isinstance(arg, tan): # atan(x) + acot(x) = pi/2 + ang = arg.args[0] + if ang.is_comparable: + ang = pi/2 - atan(arg) + if ang > pi/2: # restrict to (-pi/2,pi/2] + ang -= pi + return ang + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return pi/2 # FIX THIS + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + return S.NegativeOne**((n + 1)//2)*x**n/n + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + if x0 is S.ComplexInfinity: + return (1/arg).as_leading_term(x) + # Handling branch points + if x0 in (-S.ImaginaryUnit, S.ImaginaryUnit, S.Zero): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + # Handling points lying on branch cuts [-I, I] + if x0.is_imaginary and (1 + x0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if re(ndir).is_positive: + if im(x0).is_positive: + return self.func(x0) + pi + elif re(ndir).is_negative: + if im(x0).is_negative: + return self.func(x0) - pi + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # acot + arg0 = self.args[0].subs(x, 0) + + # Handling branch points + if arg0 in (S.ImaginaryUnit, S.NegativeOne*S.ImaginaryUnit): + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + ndir = self.args[0].dir(x, cdir if cdir else 1) + if arg0.is_zero: + if re(ndir) < 0: + return res - pi + return res + # Handling points lying on branch cuts [-I, I] + if arg0.is_imaginary and (1 + arg0**2).is_positive: + if re(ndir).is_positive: + if im(arg0).is_positive: + return res + pi + elif re(ndir).is_negative: + if im(arg0).is_negative: + return res - pi + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_aseries(self, n, args0, x, logx): + if args0[0] in [S.Infinity, S.NegativeInfinity]: + return atan(1/self.args[0])._eval_nseries(x, n, logx) + else: + return super()._eval_aseries(n, args0, x, logx) + + def _eval_rewrite_as_log(self, x, **kwargs): + return S.ImaginaryUnit/2*(log(1 - S.ImaginaryUnit/x) + - log(1 + S.ImaginaryUnit/x)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return cot + + def _eval_rewrite_as_asin(self, arg, **kwargs): + return (arg*sqrt(1/arg**2)* + (pi/2 - asin(sqrt(-arg**2)/sqrt(-arg**2 - 1)))) + + def _eval_rewrite_as_acos(self, arg, **kwargs): + return arg*sqrt(1/arg**2)*acos(sqrt(-arg**2)/sqrt(-arg**2 - 1)) + + def _eval_rewrite_as_atan(self, arg, **kwargs): + return atan(1/arg) + + def _eval_rewrite_as_asec(self, arg, **kwargs): + return arg*sqrt(1/arg**2)*asec(sqrt((1 + arg**2)/arg**2)) + + def _eval_rewrite_as_acsc(self, arg, **kwargs): + return arg*sqrt(1/arg**2)*(pi/2 - acsc(sqrt((1 + arg**2)/arg**2))) + + +class asec(InverseTrigonometricFunction): + r""" + The inverse secant function. + + Returns the arc secant of x (measured in radians). + + Explanation + =========== + + ``asec(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, 0, 1, -1\}$ and for some instances when the + result is a rational multiple of $\pi$ (see the eval class method). + + ``asec(x)`` has branch cut in the interval $[-1, 1]$. For complex arguments, + it can be defined [4]_ as + + .. math:: + \operatorname{sec^{-1}}(z) = -i\frac{\log\left(\sqrt{1 - z^2} + 1\right)}{z} + + At ``x = 0``, for positive branch cut, the limit evaluates to ``zoo``. For + negative branch cut, the limit + + .. math:: + \lim_{z \to 0}-i\frac{\log\left(-\sqrt{1 - z^2} + 1\right)}{z} + + simplifies to :math:`-i\log\left(z/2 + O\left(z^3\right)\right)` which + ultimately evaluates to ``zoo``. + + As ``acos(x) = asec(1/x)``, a similar argument can be given for + ``acos(x)``. + + Examples + ======== + + >>> from sympy import asec, oo + >>> asec(1) + 0 + >>> asec(-1) + pi + >>> asec(0) + zoo + >>> asec(-oo) + pi/2 + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acsc, acos, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://dlmf.nist.gov/4.23 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcSec + .. [4] https://reference.wolfram.com/language/ref/ArcSec.html + + """ + + @classmethod + def eval(cls, arg): + if arg.is_zero: + return S.ComplexInfinity + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.One: + return S.Zero + elif arg is S.NegativeOne: + return pi + if arg in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + return pi/2 + + if arg.is_number: + acsc_table = cls._acsc_table() + if arg in acsc_table: + return pi/2 - acsc_table[arg] + elif -arg in acsc_table: + return pi/2 + acsc_table[-arg] + + if arg.is_infinite: + return pi/2 + + if arg.is_Mul and len(arg.args) == 2 and arg.args[0] == -1: + narg = arg.args[1] + minus = True + else: + narg = arg + minus = False + + if isinstance(narg, sec): + # asec(sec(x)) = x or asec(-sec(x)) = pi - x + ang = narg.args[0] + if ang.is_comparable: + if minus: + ang = pi - ang + ang %= 2*pi # restrict to [0,2*pi) + if ang > pi: # restrict to [0,pi] + ang = 2*pi - ang + return ang + + if isinstance(narg, csc): # asec(x) + acsc(x) = pi/2 + ang = narg.args[0] + if ang.is_comparable: + if minus: + pi/2 + acsc(narg) + return pi/2 - acsc(narg) + + def fdiff(self, argindex=1): + if argindex == 1: + return 1/(self.args[0]**2*sqrt(1 - 1/self.args[0]**2)) + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return sec + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return S.ImaginaryUnit*log(2 / x) + elif n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 2 and n > 2: + p = previous_terms[-2] + return p * ((n - 1)*(n-2)) * x**2/(4 * (n//2)**2) + else: + k = n // 2 + R = RisingFactorial(S.Half, k) * n + F = factorial(k) * n // 2 * n // 2 + return -S.ImaginaryUnit * R / F * x**n / 4 + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + # Handling branch points + if x0 == 1: + return sqrt(2)*sqrt((arg - S.One).as_leading_term(x)) + if x0 in (-S.One, S.Zero): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir) + # Handling points lying on branch cuts (-1, 1) + if x0.is_real and (1 - x0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_positive: + return -self.func(x0) + elif im(ndir).is_positive: + if x0.is_negative: + return 2*pi - self.func(x0) + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # asec + from sympy.series.order import O + arg0 = self.args[0].subs(x, 0) + # Handling branch points + if arg0 is S.One: + t = Dummy('t', positive=True) + ser = asec(S.One + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.NegativeOne + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + if arg0 is S.NegativeOne: + t = Dummy('t', positive=True) + ser = asec(S.NegativeOne - t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.NegativeOne - self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + # Handling points lying on branch cuts (-1, 1) + if arg0.is_real and (1 - arg0**2).is_positive: + ndir = self.args[0].dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_positive: + return -res + elif im(ndir).is_positive: + if arg0.is_negative: + return 2*pi - res + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_is_extended_real(self): + x = self.args[0] + if x.is_extended_real is False: + return False + return fuzzy_or(((x - 1).is_nonnegative, (-x - 1).is_nonnegative)) + + def _eval_rewrite_as_log(self, arg, **kwargs): + return pi/2 + S.ImaginaryUnit*log(S.ImaginaryUnit/arg + sqrt(1 - 1/arg**2)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_asin(self, arg, **kwargs): + return pi/2 - asin(1/arg) + + def _eval_rewrite_as_acos(self, arg, **kwargs): + return acos(1/arg) + + def _eval_rewrite_as_atan(self, x, **kwargs): + sx2x = sqrt(x**2)/x + return pi/2*(1 - sx2x) + sx2x*atan(sqrt(x**2 - 1)) + + def _eval_rewrite_as_acot(self, x, **kwargs): + sx2x = sqrt(x**2)/x + return pi/2*(1 - sx2x) + sx2x*acot(1/sqrt(x**2 - 1)) + + def _eval_rewrite_as_acsc(self, arg, **kwargs): + return pi/2 - acsc(arg) + + +class acsc(InverseTrigonometricFunction): + r""" + The inverse cosecant function. + + Returns the arc cosecant of x (measured in radians). + + Explanation + =========== + + ``acsc(x)`` will evaluate automatically in the cases + $x \in \{\infty, -\infty, 0, 1, -1\}$` and for some instances when the + result is a rational multiple of $\pi$ (see the ``eval`` class method). + + Examples + ======== + + >>> from sympy import acsc, oo + >>> acsc(1) + pi/2 + >>> acsc(-1) + -pi/2 + >>> acsc(oo) + 0 + >>> acsc(-oo) == acsc(oo) + True + >>> acsc(0) + zoo + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acos, asec, atan, acot, atan2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://dlmf.nist.gov/4.23 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcCsc + + """ + + @classmethod + def eval(cls, arg): + if arg.is_zero: + return S.ComplexInfinity + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.One: + return pi/2 + elif arg is S.NegativeOne: + return -pi/2 + if arg in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + return S.Zero + + if arg.could_extract_minus_sign(): + return -cls(-arg) + + if arg.is_infinite: + return S.Zero + + if arg.is_number: + acsc_table = cls._acsc_table() + if arg in acsc_table: + return acsc_table[arg] + + if isinstance(arg, csc): + ang = arg.args[0] + if ang.is_comparable: + ang %= 2*pi # restrict to [0,2*pi) + if ang > pi: # restrict to (-pi,pi] + ang = pi - ang + + # restrict to [-pi/2,pi/2] + if ang > pi/2: + ang = pi - ang + if ang < -pi/2: + ang = -pi - ang + + return ang + + if isinstance(arg, sec): # asec(x) + acsc(x) = pi/2 + ang = arg.args[0] + if ang.is_comparable: + return pi/2 - asec(arg) + + def fdiff(self, argindex=1): + if argindex == 1: + return -1/(self.args[0]**2*sqrt(1 - 1/self.args[0]**2)) + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + """ + return csc + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return pi/2 - S.ImaginaryUnit*log(2) + S.ImaginaryUnit*log(x) + elif n < 0 or n % 2 == 1: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 2 and n > 2: + p = previous_terms[-2] + return p * ((n - 1)*(n-2)) * x**2/(4 * (n//2)**2) + else: + k = n // 2 + R = RisingFactorial(S.Half, k) * n + F = factorial(k) * n // 2 * n // 2 + return S.ImaginaryUnit * R / F * x**n / 4 + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0] + x0 = arg.subs(x, 0).cancel() + if x0 is S.NaN: + return self.func(arg.as_leading_term(x)) + # Handling branch points + if x0 in (-S.One, S.One, S.Zero): + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + if x0 is S.ComplexInfinity: + return (1/arg).as_leading_term(x) + # Handling points lying on branch cuts (-1, 1) + if x0.is_real and (1 - x0**2).is_positive: + ndir = arg.dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if x0.is_positive: + return pi - self.func(x0) + elif im(ndir).is_positive: + if x0.is_negative: + return -pi - self.func(x0) + else: + return self.rewrite(log)._eval_as_leading_term(x, logx=logx, cdir=cdir).expand() + return self.func(x0) + + def _eval_nseries(self, x, n, logx, cdir=0): # acsc + from sympy.series.order import O + arg0 = self.args[0].subs(x, 0) + # Handling branch points + if arg0 is S.One: + t = Dummy('t', positive=True) + ser = acsc(S.One + t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.NegativeOne + self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + if arg0 is S.NegativeOne: + t = Dummy('t', positive=True) + ser = acsc(S.NegativeOne - t**2).rewrite(log).nseries(t, 0, 2*n) + arg1 = S.NegativeOne - self.args[0] + f = arg1.as_leading_term(x) + g = (arg1 - f)/ f + res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx) + res = (res1.removeO()*sqrt(f)).expand() + return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x) + + res = super()._eval_nseries(x, n=n, logx=logx) + if arg0 is S.ComplexInfinity: + return res + # Handling points lying on branch cuts (-1, 1) + if arg0.is_real and (1 - arg0**2).is_positive: + ndir = self.args[0].dir(x, cdir if cdir else 1) + if im(ndir).is_negative: + if arg0.is_positive: + return pi - res + elif im(ndir).is_positive: + if arg0.is_negative: + return -pi - res + else: + return self.rewrite(log)._eval_nseries(x, n, logx=logx, cdir=cdir) + return res + + def _eval_rewrite_as_log(self, arg, **kwargs): + return -S.ImaginaryUnit*log(S.ImaginaryUnit/arg + sqrt(1 - 1/arg**2)) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + def _eval_rewrite_as_asin(self, arg, **kwargs): + return asin(1/arg) + + def _eval_rewrite_as_acos(self, arg, **kwargs): + return pi/2 - acos(1/arg) + + def _eval_rewrite_as_atan(self, x, **kwargs): + return sqrt(x**2)/x*(pi/2 - atan(sqrt(x**2 - 1))) + + def _eval_rewrite_as_acot(self, arg, **kwargs): + return sqrt(arg**2)/arg*(pi/2 - acot(1/sqrt(arg**2 - 1))) + + def _eval_rewrite_as_asec(self, arg, **kwargs): + return pi/2 - asec(arg) + + +class atan2(InverseTrigonometricFunction): + r""" + The function ``atan2(y, x)`` computes `\operatorname{atan}(y/x)` taking + two arguments `y` and `x`. Signs of both `y` and `x` are considered to + determine the appropriate quadrant of `\operatorname{atan}(y/x)`. + The range is `(-\pi, \pi]`. The complete definition reads as follows: + + .. math:: + + \operatorname{atan2}(y, x) = + \begin{cases} + \arctan\left(\frac y x\right) & \qquad x > 0 \\ + \arctan\left(\frac y x\right) + \pi& \qquad y \ge 0, x < 0 \\ + \arctan\left(\frac y x\right) - \pi& \qquad y < 0, x < 0 \\ + +\frac{\pi}{2} & \qquad y > 0, x = 0 \\ + -\frac{\pi}{2} & \qquad y < 0, x = 0 \\ + \text{undefined} & \qquad y = 0, x = 0 + \end{cases} + + Attention: Note the role reversal of both arguments. The `y`-coordinate + is the first argument and the `x`-coordinate the second. + + If either `x` or `y` is complex: + + .. math:: + + \operatorname{atan2}(y, x) = + -i\log\left(\frac{x + iy}{\sqrt{x^2 + y^2}}\right) + + Examples + ======== + + Going counter-clock wise around the origin we find the + following angles: + + >>> from sympy import atan2 + >>> atan2(0, 1) + 0 + >>> atan2(1, 1) + pi/4 + >>> atan2(1, 0) + pi/2 + >>> atan2(1, -1) + 3*pi/4 + >>> atan2(0, -1) + pi + >>> atan2(-1, -1) + -3*pi/4 + >>> atan2(-1, 0) + -pi/2 + >>> atan2(-1, 1) + -pi/4 + + which are all correct. Compare this to the results of the ordinary + `\operatorname{atan}` function for the point `(x, y) = (-1, 1)` + + >>> from sympy import atan, S + >>> atan(S(1)/-1) + -pi/4 + >>> atan2(1, -1) + 3*pi/4 + + where only the `\operatorname{atan2}` function returns what we expect. + We can differentiate the function with respect to both arguments: + + >>> from sympy import diff + >>> from sympy.abc import x, y + >>> diff(atan2(y, x), x) + -y/(x**2 + y**2) + + >>> diff(atan2(y, x), y) + x/(x**2 + y**2) + + We can express the `\operatorname{atan2}` function in terms of + complex logarithms: + + >>> from sympy import log + >>> atan2(y, x).rewrite(log) + -I*log((x + I*y)/sqrt(x**2 + y**2)) + + and in terms of `\operatorname(atan)`: + + >>> from sympy import atan + >>> atan2(y, x).rewrite(atan) + Piecewise((2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)), (pi, re(x) < 0), (0, Ne(x, 0)), (nan, True)) + + but note that this form is undefined on the negative real axis. + + See Also + ======== + + sin, csc, cos, sec, tan, cot + asin, acsc, acos, asec, atan, acot + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions + .. [2] https://en.wikipedia.org/wiki/Atan2 + .. [3] https://functions.wolfram.com/ElementaryFunctions/ArcTan2 + + """ + + @classmethod + def eval(cls, y, x): + from sympy.functions.special.delta_functions import Heaviside + if x is S.NegativeInfinity: + if y.is_zero: + # Special case y = 0 because we define Heaviside(0) = 1/2 + return pi + return 2*pi*(Heaviside(re(y))) - pi + elif x is S.Infinity: + return S.Zero + elif x.is_imaginary and y.is_imaginary and x.is_number and y.is_number: + x = im(x) + y = im(y) + + if x.is_extended_real and y.is_extended_real: + if x.is_positive: + return atan(y/x) + elif x.is_negative: + if y.is_negative: + return atan(y/x) - pi + elif y.is_nonnegative: + return atan(y/x) + pi + elif x.is_zero: + if y.is_positive: + return pi/2 + elif y.is_negative: + return -pi/2 + elif y.is_zero: + return S.NaN + if y.is_zero: + if x.is_extended_nonzero: + return pi*(S.One - Heaviside(x)) + if x.is_number: + return Piecewise((pi, re(x) < 0), + (0, Ne(x, 0)), + (S.NaN, True)) + if x.is_number and y.is_number: + return -S.ImaginaryUnit*log( + (x + S.ImaginaryUnit*y)/sqrt(x**2 + y**2)) + + def _eval_rewrite_as_log(self, y, x, **kwargs): + return -S.ImaginaryUnit*log((x + S.ImaginaryUnit*y)/sqrt(x**2 + y**2)) + + def _eval_rewrite_as_atan(self, y, x, **kwargs): + return Piecewise((2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)), + (pi, re(x) < 0), + (0, Ne(x, 0)), + (S.NaN, True)) + + def _eval_rewrite_as_arg(self, y, x, **kwargs): + if x.is_extended_real and y.is_extended_real: + return arg_f(x + y*S.ImaginaryUnit) + n = x + S.ImaginaryUnit*y + d = x**2 + y**2 + return arg_f(n/sqrt(d)) - S.ImaginaryUnit*log(abs(n)/sqrt(abs(d))) + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real and self.args[1].is_extended_real + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate(), self.args[1].conjugate()) + + def fdiff(self, argindex): + y, x = self.args + if argindex == 1: + # Diff wrt y + return x/(x**2 + y**2) + elif argindex == 2: + # Diff wrt x + return 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0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/benchmarks/bench_special.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/benchmarks/bench_special.py new file mode 100644 index 0000000000000000000000000000000000000000..25d7280c2cf31dcbff08065a78847ed03e0ebb05 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/benchmarks/bench_special.py @@ -0,0 +1,8 @@ +from sympy.core.symbol import symbols +from sympy.functions.special.spherical_harmonics import Ynm + +x, y = symbols('x,y') + + +def timeit_Ynm_xy(): + Ynm(1, 1, x, y) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/bessel.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/bessel.py new file mode 100644 index 0000000000000000000000000000000000000000..a24e7dc442d2a5a9bf7047113fd81b36c6b6ba36 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/bessel.py @@ -0,0 +1,2208 @@ +from functools import wraps + +from sympy.core import S +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.expr import Expr +from sympy.core.function import DefinedFunction, ArgumentIndexError, _mexpand +from sympy.core.logic import fuzzy_or, fuzzy_not +from sympy.core.numbers import Rational, pi, I +from sympy.core.power import Pow +from sympy.core.symbol import Dummy, uniquely_named_symbol, Wild +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial, RisingFactorial +from sympy.functions.elementary.trigonometric import sin, cos, csc, cot +from sympy.functions.elementary.integers import ceiling +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import cbrt, sqrt, root +from sympy.functions.elementary.complexes import (Abs, re, im, polar_lift, unpolarify) +from sympy.functions.special.gamma_functions import gamma, digamma, uppergamma +from sympy.functions.special.hyper import hyper +from sympy.polys.orthopolys import spherical_bessel_fn + +from mpmath import mp, workprec + +# TODO +# o Scorer functions G1 and G2 +# o Asymptotic expansions +# These are possible, e.g. for fixed order, but since the bessel type +# functions are oscillatory they are not actually tractable at +# infinity, so this is not particularly useful right now. +# o Nicer series expansions. +# o More rewriting. +# o Add solvers to ode.py (or rather add solvers for the hypergeometric equation). + + +class BesselBase(DefinedFunction): + """ + Abstract base class for Bessel-type functions. + + This class is meant to reduce code duplication. + All Bessel-type functions can 1) be differentiated, with the derivatives + expressed in terms of similar functions, and 2) be rewritten in terms + of other Bessel-type functions. + + Here, Bessel-type functions are assumed to have one complex parameter. + + To use this base class, define class attributes ``_a`` and ``_b`` such that + ``2*F_n' = -_a*F_{n+1} + b*F_{n-1}``. + + """ + + @property + def order(self): + """ The order of the Bessel-type function. """ + return self.args[0] + + @property + def argument(self): + """ The argument of the Bessel-type function. """ + return self.args[1] + + @classmethod + def eval(cls, nu, z): + return + + def fdiff(self, argindex=2): + if argindex != 2: + raise ArgumentIndexError(self, argindex) + return (self._b/2 * self.__class__(self.order - 1, self.argument) - + self._a/2 * self.__class__(self.order + 1, self.argument)) + + def _eval_conjugate(self): + z = self.argument + if z.is_extended_negative is False: + return self.__class__(self.order.conjugate(), z.conjugate()) + + def _eval_is_meromorphic(self, x, a): + nu, z = self.order, self.argument + + if nu.has(x): + return False + if not z._eval_is_meromorphic(x, a): + return None + z0 = z.subs(x, a) + if nu.is_integer: + if isinstance(self, (besselj, besseli, hn1, hn2, jn, yn)) or not nu.is_zero: + return fuzzy_not(z0.is_infinite) + return fuzzy_not(fuzzy_or([z0.is_zero, z0.is_infinite])) + + def _eval_expand_func(self, **hints): + nu, z, f = self.order, self.argument, self.__class__ + if nu.is_real: + if (nu - 1).is_positive: + return (-self._a*self._b*f(nu - 2, z)._eval_expand_func() + + 2*self._a*(nu - 1)*f(nu - 1, z)._eval_expand_func()/z) + elif (nu + 1).is_negative: + return (2*self._b*(nu + 1)*f(nu + 1, z)._eval_expand_func()/z - + self._a*self._b*f(nu + 2, z)._eval_expand_func()) + return self + + def _eval_simplify(self, **kwargs): + from sympy.simplify.simplify import besselsimp + return besselsimp(self) + + +class besselj(BesselBase): + r""" + Bessel function of the first kind. + + Explanation + =========== + + The Bessel $J$ function of order $\nu$ is defined to be the function + satisfying Bessel's differential equation + + .. math :: + z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2} + + z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 - \nu^2) w = 0, + + with Laurent expansion + + .. math :: + J_\nu(z) = z^\nu \left(\frac{1}{\Gamma(\nu + 1) 2^\nu} + O(z^2) \right), + + if $\nu$ is not a negative integer. If $\nu=-n \in \mathbb{Z}_{<0}$ + *is* a negative integer, then the definition is + + .. math :: + J_{-n}(z) = (-1)^n J_n(z). + + Examples + ======== + + Create a Bessel function object: + + >>> from sympy import besselj, jn + >>> from sympy.abc import z, n + >>> b = besselj(n, z) + + Differentiate it: + + >>> b.diff(z) + besselj(n - 1, z)/2 - besselj(n + 1, z)/2 + + Rewrite in terms of spherical Bessel functions: + + >>> b.rewrite(jn) + sqrt(2)*sqrt(z)*jn(n - 1/2, z)/sqrt(pi) + + Access the parameter and argument: + + >>> b.order + n + >>> b.argument + z + + See Also + ======== + + bessely, besseli, besselk + + References + ========== + + .. [1] Abramowitz, Milton; Stegun, Irene A., eds. (1965), "Chapter 9", + Handbook of Mathematical Functions with Formulas, Graphs, and + Mathematical Tables + .. [2] Luke, Y. L. (1969), The Special Functions and Their + Approximations, Volume 1 + .. [3] https://en.wikipedia.org/wiki/Bessel_function + .. [4] https://functions.wolfram.com/Bessel-TypeFunctions/BesselJ/ + + """ + + _a = S.One + _b = S.One + + @classmethod + def eval(cls, nu, z): + if z.is_zero: + if nu.is_zero: + return S.One + elif (nu.is_integer and nu.is_zero is False) or re(nu).is_positive: + return S.Zero + elif re(nu).is_negative and not (nu.is_integer is True): + return S.ComplexInfinity + elif nu.is_imaginary: + return S.NaN + if z in (S.Infinity, S.NegativeInfinity): + return S.Zero + + if z.could_extract_minus_sign(): + return (z)**nu*(-z)**(-nu)*besselj(nu, -z) + if nu.is_integer: + if nu.could_extract_minus_sign(): + return S.NegativeOne**(-nu)*besselj(-nu, z) + newz = z.extract_multiplicatively(I) + if newz: # NOTE we don't want to change the function if z==0 + return I**(nu)*besseli(nu, newz) + + # branch handling: + if nu.is_integer: + newz = unpolarify(z) + if newz != z: + return besselj(nu, newz) + else: + newz, n = z.extract_branch_factor() + if n != 0: + return exp(2*n*pi*nu*I)*besselj(nu, newz) + nnu = unpolarify(nu) + if nu != nnu: + return besselj(nnu, z) + + def _eval_rewrite_as_besseli(self, nu, z, **kwargs): + return exp(I*pi*nu/2)*besseli(nu, polar_lift(-I)*z) + + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + if nu.is_integer is False: + return csc(pi*nu)*bessely(-nu, z) - cot(pi*nu)*bessely(nu, z) + + def _eval_rewrite_as_jn(self, nu, z, **kwargs): + return sqrt(2*z/pi)*jn(nu - S.Half, self.argument) + + def _eval_as_leading_term(self, x, logx, cdir): + nu, z = self.args + try: + arg = z.as_leading_term(x) + except NotImplementedError: + return self + c, e = arg.as_coeff_exponent(x) + + if e.is_positive: + return arg**nu/(2**nu*gamma(nu + 1)) + elif e.is_negative: + cdir = 1 if cdir == 0 else cdir + sign = c*cdir**e + if not sign.is_negative: + # Refer Abramowitz and Stegun 1965, p. 364 for more information on + # asymptotic approximation of besselj function. + return sqrt(2)*cos(z - pi*(2*nu + 1)/4)/sqrt(pi*z) + return self + + return super(besselj, self)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_is_extended_real(self): + nu, z = self.args + if nu.is_integer and z.is_extended_real: + return True + + def _eval_nseries(self, x, n, logx, cdir=0): + # Refer https://functions.wolfram.com/Bessel-TypeFunctions/BesselJ/06/01/04/01/01/0003/ + # for more information on nseries expansion of besselj function. + from sympy.series.order import Order + nu, z = self.args + + # In case of powers less than 1, number of terms need to be computed + # separately to avoid repeated callings of _eval_nseries with wrong n + try: + _, exp = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + if exp.is_positive: + newn = ceiling(n/exp) + o = Order(x**n, x) + r = (z/2)._eval_nseries(x, n, logx, cdir).removeO() + if r is S.Zero: + return o + t = (_mexpand(r**2) + o).removeO() + + term = r**nu/gamma(nu + 1) + s = [term] + for k in range(1, (newn + 1)//2): + term *= -t/(k*(nu + k)) + term = (_mexpand(term) + o).removeO() + s.append(term) + return Add(*s) + o + + return super(besselj, self)._eval_nseries(x, n, logx, cdir) + + +class bessely(BesselBase): + r""" + Bessel function of the second kind. + + Explanation + =========== + + The Bessel $Y$ function of order $\nu$ is defined as + + .. math :: + Y_\nu(z) = \lim_{\mu \to \nu} \frac{J_\mu(z) \cos(\pi \mu) + - J_{-\mu}(z)}{\sin(\pi \mu)}, + + where $J_\mu(z)$ is the Bessel function of the first kind. + + It is a solution to Bessel's equation, and linearly independent from + $J_\nu$. + + Examples + ======== + + >>> from sympy import bessely, yn + >>> from sympy.abc import z, n + >>> b = bessely(n, z) + >>> b.diff(z) + bessely(n - 1, z)/2 - bessely(n + 1, z)/2 + >>> b.rewrite(yn) + sqrt(2)*sqrt(z)*yn(n - 1/2, z)/sqrt(pi) + + See Also + ======== + + besselj, besseli, besselk + + References + ========== + + .. [1] https://functions.wolfram.com/Bessel-TypeFunctions/BesselY/ + + """ + + _a = S.One + _b = S.One + + @classmethod + def eval(cls, nu, z): + if z.is_zero: + if nu.is_zero: + return S.NegativeInfinity + elif re(nu).is_zero is False: + return S.ComplexInfinity + elif re(nu).is_zero: + return S.NaN + if z in (S.Infinity, S.NegativeInfinity): + return S.Zero + if z == I*S.Infinity: + return exp(I*pi*(nu + 1)/2) * S.Infinity + if z == I*S.NegativeInfinity: + return exp(-I*pi*(nu + 1)/2) * S.Infinity + + if nu.is_integer: + if nu.could_extract_minus_sign(): + return S.NegativeOne**(-nu)*bessely(-nu, z) + + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + if nu.is_integer is False: + return csc(pi*nu)*(cos(pi*nu)*besselj(nu, z) - besselj(-nu, z)) + + def _eval_rewrite_as_besseli(self, nu, z, **kwargs): + aj = self._eval_rewrite_as_besselj(*self.args) + if aj: + return aj.rewrite(besseli) + + def _eval_rewrite_as_yn(self, nu, z, **kwargs): + return sqrt(2*z/pi) * yn(nu - S.Half, self.argument) + + def _eval_as_leading_term(self, x, logx, cdir): + nu, z = self.args + try: + arg = z.as_leading_term(x) + except NotImplementedError: + return self + c, e = arg.as_coeff_exponent(x) + + if e.is_positive: + term_one = ((2/pi)*log(z/2)*besselj(nu, z)) + term_two = -(z/2)**(-nu)*factorial(nu - 1)/pi if (nu).is_positive else S.Zero + term_three = -(z/2)**nu/(pi*factorial(nu))*(digamma(nu + 1) - S.EulerGamma) + arg = Add(*[term_one, term_two, term_three]).as_leading_term(x, logx=logx) + return arg + elif e.is_negative: + cdir = 1 if cdir == 0 else cdir + sign = c*cdir**e + if not sign.is_negative: + # Refer Abramowitz and Stegun 1965, p. 364 for more information on + # asymptotic approximation of bessely function. + return sqrt(2)*(-sin(pi*nu/2 - z + pi/4) + 3*cos(pi*nu/2 - z + pi/4)/(8*z))*sqrt(1/z)/sqrt(pi) + return self + + return super(bessely, self)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_is_extended_real(self): + nu, z = self.args + if nu.is_integer and z.is_positive: + return True + + def _eval_nseries(self, x, n, logx, cdir=0): + # Refer https://functions.wolfram.com/Bessel-TypeFunctions/BesselY/06/01/04/01/02/0008/ + # for more information on nseries expansion of bessely function. + from sympy.series.order import Order + nu, z = self.args + + # In case of powers less than 1, number of terms need to be computed + # separately to avoid repeated callings of _eval_nseries with wrong n + try: + _, exp = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + if exp.is_positive and nu.is_integer: + newn = ceiling(n/exp) + bn = besselj(nu, z) + a = ((2/pi)*log(z/2)*bn)._eval_nseries(x, n, logx, cdir) + + b, c = [], [] + o = Order(x**n, x) + r = (z/2)._eval_nseries(x, n, logx, cdir).removeO() + if r is S.Zero: + return o + t = (_mexpand(r**2) + o).removeO() + + if nu > S.Zero: + term = r**(-nu)*factorial(nu - 1)/pi + b.append(term) + for k in range(1, nu): + denom = (nu - k)*k + if denom == S.Zero: + term *= t/k + else: + term *= t/denom + term = (_mexpand(term) + o).removeO() + b.append(term) + + p = r**nu/(pi*factorial(nu)) + term = p*(digamma(nu + 1) - S.EulerGamma) + c.append(term) + for k in range(1, (newn + 1)//2): + p *= -t/(k*(k + nu)) + p = (_mexpand(p) + o).removeO() + term = p*(digamma(k + nu + 1) + digamma(k + 1)) + c.append(term) + return a - Add(*b) - Add(*c) # Order term comes from a + + return super(bessely, self)._eval_nseries(x, n, logx, cdir) + + +class besseli(BesselBase): + r""" + Modified Bessel function of the first kind. + + Explanation + =========== + + The Bessel $I$ function is a solution to the modified Bessel equation + + .. math :: + z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2} + + z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 + \nu^2)^2 w = 0. + + It can be defined as + + .. math :: + I_\nu(z) = i^{-\nu} J_\nu(iz), + + where $J_\nu(z)$ is the Bessel function of the first kind. + + Examples + ======== + + >>> from sympy import besseli + >>> from sympy.abc import z, n + >>> besseli(n, z).diff(z) + besseli(n - 1, z)/2 + besseli(n + 1, z)/2 + + See Also + ======== + + besselj, bessely, besselk + + References + ========== + + .. [1] https://functions.wolfram.com/Bessel-TypeFunctions/BesselI/ + + """ + + _a = -S.One + _b = S.One + + @classmethod + def eval(cls, nu, z): + if z.is_zero: + if nu.is_zero: + return S.One + elif (nu.is_integer and nu.is_zero is False) or re(nu).is_positive: + return S.Zero + elif re(nu).is_negative and not (nu.is_integer is True): + return S.ComplexInfinity + elif nu.is_imaginary: + return S.NaN + if im(z) in (S.Infinity, S.NegativeInfinity): + return S.Zero + if z is S.Infinity: + return S.Infinity + if z is S.NegativeInfinity: + return (-1)**nu*S.Infinity + + if z.could_extract_minus_sign(): + return (z)**nu*(-z)**(-nu)*besseli(nu, -z) + if nu.is_integer: + if nu.could_extract_minus_sign(): + return besseli(-nu, z) + newz = z.extract_multiplicatively(I) + if newz: # NOTE we don't want to change the function if z==0 + return I**(-nu)*besselj(nu, -newz) + + # branch handling: + if nu.is_integer: + newz = unpolarify(z) + if newz != z: + return besseli(nu, newz) + else: + newz, n = z.extract_branch_factor() + if n != 0: + return exp(2*n*pi*nu*I)*besseli(nu, newz) + nnu = unpolarify(nu) + if nu != nnu: + return besseli(nnu, z) + + def _eval_rewrite_as_tractable(self, nu, z, limitvar=None, **kwargs): + if z.is_extended_real: + return exp(z)*_besseli(nu, z) + + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + return exp(-I*pi*nu/2)*besselj(nu, polar_lift(I)*z) + + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + aj = self._eval_rewrite_as_besselj(*self.args) + if aj: + return aj.rewrite(bessely) + + def _eval_rewrite_as_jn(self, nu, z, **kwargs): + return self._eval_rewrite_as_besselj(*self.args).rewrite(jn) + + def _eval_is_extended_real(self): + nu, z = self.args + if nu.is_integer and z.is_extended_real: + return True + + def _eval_as_leading_term(self, x, logx, cdir): + nu, z = self.args + try: + arg = z.as_leading_term(x) + except NotImplementedError: + return self + c, e = arg.as_coeff_exponent(x) + + if e.is_positive: + return arg**nu/(2**nu*gamma(nu + 1)) + elif e.is_negative: + cdir = 1 if cdir == 0 else cdir + sign = c*cdir**e + if not sign.is_negative: + # Refer Abramowitz and Stegun 1965, p. 377 for more information on + # asymptotic approximation of besseli function. + return exp(z)/sqrt(2*pi*z) + return self + + return super(besseli, self)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + # Refer https://functions.wolfram.com/Bessel-TypeFunctions/BesselI/06/01/04/01/01/0003/ + # for more information on nseries expansion of besseli function. + from sympy.series.order import Order + nu, z = self.args + + # In case of powers less than 1, number of terms need to be computed + # separately to avoid repeated callings of _eval_nseries with wrong n + try: + _, exp = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + if exp.is_positive: + newn = ceiling(n/exp) + o = Order(x**n, x) + r = (z/2)._eval_nseries(x, n, logx, cdir).removeO() + if r is S.Zero: + return o + t = (_mexpand(r**2) + o).removeO() + + term = r**nu/gamma(nu + 1) + s = [term] + for k in range(1, (newn + 1)//2): + term *= t/(k*(nu + k)) + term = (_mexpand(term) + o).removeO() + s.append(term) + return Add(*s) + o + + return super(besseli, self)._eval_nseries(x, n, logx, cdir) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.functions.combinatorial.factorials import RisingFactorial + from sympy.series.order import Order + point = args0[1] + + if point in [S.Infinity, S.NegativeInfinity]: + nu, z = self.args + s = [(RisingFactorial(Rational(2*nu - 1, 2), k)*RisingFactorial(Rational(2*nu + 1, 2), k))/\ + ((2)**(k)*z**(Rational(2*k + 1, 2))*factorial(k)) for k in range(n)] + [Order(1/z**(Rational(2*n + 1, 2)), x)] + return exp(z)/sqrt(2*pi) * (Add(*s)) + + return super()._eval_aseries(n, args0, x, logx) + + +class besselk(BesselBase): + r""" + Modified Bessel function of the second kind. + + Explanation + =========== + + The Bessel $K$ function of order $\nu$ is defined as + + .. math :: + K_\nu(z) = \lim_{\mu \to \nu} \frac{\pi}{2} + \frac{I_{-\mu}(z) -I_\mu(z)}{\sin(\pi \mu)}, + + where $I_\mu(z)$ is the modified Bessel function of the first kind. + + It is a solution of the modified Bessel equation, and linearly independent + from $Y_\nu$. + + Examples + ======== + + >>> from sympy import besselk + >>> from sympy.abc import z, n + >>> besselk(n, z).diff(z) + -besselk(n - 1, z)/2 - besselk(n + 1, z)/2 + + See Also + ======== + + besselj, besseli, bessely + + References + ========== + + .. [1] https://functions.wolfram.com/Bessel-TypeFunctions/BesselK/ + + """ + + _a = S.One + _b = -S.One + + @classmethod + def eval(cls, nu, z): + if z.is_zero: + if nu.is_zero: + return S.Infinity + elif re(nu).is_zero is False: + return S.ComplexInfinity + elif re(nu).is_zero: + return S.NaN + if z in (S.Infinity, I*S.Infinity, I*S.NegativeInfinity): + return S.Zero + + if nu.is_integer: + if nu.could_extract_minus_sign(): + return besselk(-nu, z) + + def _eval_rewrite_as_besseli(self, nu, z, **kwargs): + if nu.is_integer is False: + return pi*csc(pi*nu)*(besseli(-nu, z) - besseli(nu, z))/2 + + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + ai = self._eval_rewrite_as_besseli(*self.args) + if ai: + return ai.rewrite(besselj) + + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + aj = self._eval_rewrite_as_besselj(*self.args) + if aj: + return aj.rewrite(bessely) + + def _eval_rewrite_as_yn(self, nu, z, **kwargs): + ay = self._eval_rewrite_as_bessely(*self.args) + if ay: + return ay.rewrite(yn) + + def _eval_is_extended_real(self): + nu, z = self.args + if nu.is_integer and z.is_positive: + return True + + def _eval_rewrite_as_tractable(self, nu, z, limitvar=None, **kwargs): + if z.is_extended_real: + return exp(-z)*_besselk(nu, z) + + def _eval_as_leading_term(self, x, logx, cdir): + nu, z = self.args + try: + arg = z.as_leading_term(x) + except NotImplementedError: + return self + _, e = arg.as_coeff_exponent(x) + + if e.is_positive: + if nu.is_zero: + # Equation 9.6.8 of Abramowitz and Stegun (10th ed, 1972). + term = -log(z) - S.EulerGamma + log(2) + elif nu.is_nonzero: + # Equation 9.6.9 of Abramowitz and Stegun (10th ed, 1972). + term = gamma(Abs(nu))*(z/2)**(-Abs(nu))/2 + else: + raise NotImplementedError(f"Cannot proceed without knowing if {nu} is zero or not.") + + return term.as_leading_term(x, logx=logx) + elif e.is_negative: + # Equation 9.7.2 of Abramowitz and Stegun (10th ed, 1972). + return sqrt(pi)*exp(-arg)/sqrt(2*arg) + else: + return self.func(nu, arg) + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.series.order import Order + nu, z = self.args + + try: + _, exp = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + # In case of powers less than 1, number of terms need to be computed + # separately to avoid repeated callings of _eval_nseries with wrong n + if exp.is_positive: + r = (z/2)._eval_nseries(x, n, logx, cdir).removeO() + if r is S.Zero: + return Order(z**(-nu) + z**nu, x) + + o = Order(x**n, x) + if nu.is_integer: + # Reference: https://functions.wolfram.com/Bessel-TypeFunctions/BesselK/06/01/04/01/02/0008/ (only for integer order) + newn = ceiling(n/exp) + bn = besseli(nu, z) + a = ((-1)**(nu - 1)*log(z/2)*bn)._eval_nseries(x, n, logx, cdir) + + b, c = [], [] + t = _mexpand(r**2) + + if nu > S.Zero: + term = r**(-nu)*factorial(nu - 1)/2 + b.append(term) + for k in range(1, nu): + term *= t/((k - nu)*k) + term = (_mexpand(term) + o).removeO() + b.append(term) + + p = r**nu*(-1)**nu/(2*factorial(nu)) + term = p*(digamma(nu + 1) - S.EulerGamma) + c.append(term) + for k in range(1, (newn + 1)//2): + p *= t/(k*(k + nu)) + p = (_mexpand(p) + o).removeO() + term = p*(digamma(k + nu + 1) + digamma(k + 1)) + c.append(term) + return a + Add(*b) + Add(*c) + o + elif nu.is_noninteger: + # Reference: https://functions.wolfram.com/Bessel-TypeFunctions/BesselK/06/01/04/01/01/0003/ + # (only for non-integer order). + # While the expression in the reference above seems correct + # for non-real order as well, it would need some manipulation + # (not implemented) to be written as a power series in x with + # real exponents [e.g. Dunster 1990. "Bessel functions + # of purely imaginary order, with an application to second-order + # linear differential equations having a large parameter". + # SIAM J. Math. Anal. Vol 21, No. 4, pp 995-1018.]. + newn_a = ceiling((n+nu)/exp) + newn_b = ceiling((n-nu)/exp) + + a, b = [], [] + for k in range((newn_a+1)//2): + term = gamma(nu)*r**(2*k-nu)/(2*RisingFactorial(1-nu, k)*factorial(k)) + a.append(_mexpand(term)) + for k in range((newn_b+1)//2): + term = gamma(-nu)*r**(2*k+nu)/(2*RisingFactorial(nu+1, k)*factorial(k)) + b.append(_mexpand(term)) + return Add(*a) + Add(*b) + o + else: + raise NotImplementedError("besselk expansion is only implemented for real order") + + return super(besselk, self)._eval_nseries(x, n, logx, cdir) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.functions.combinatorial.factorials import RisingFactorial + from sympy.series.order import Order + point = args0[1] + + if point in [S.Infinity, S.NegativeInfinity]: + nu, z = self.args + s = [(RisingFactorial(Rational(2*nu - 1, 2), k)*RisingFactorial(Rational(2*nu + 1, 2), k))/\ + ((-2)**(k)*z**(Rational(2*k + 1, 2))*factorial(k)) for k in range(n)] +[Order(1/z**(Rational(2*n + 1, 2)), x)] + return (exp(-z)*sqrt(pi/2))*Add(*s) + + return super()._eval_aseries(n, args0, x, logx) + + +class hankel1(BesselBase): + r""" + Hankel function of the first kind. + + Explanation + =========== + + This function is defined as + + .. math :: + H_\nu^{(1)} = J_\nu(z) + iY_\nu(z), + + where $J_\nu(z)$ is the Bessel function of the first kind, and + $Y_\nu(z)$ is the Bessel function of the second kind. + + It is a solution to Bessel's equation. + + Examples + ======== + + >>> from sympy import hankel1 + >>> from sympy.abc import z, n + >>> hankel1(n, z).diff(z) + hankel1(n - 1, z)/2 - hankel1(n + 1, z)/2 + + See Also + ======== + + hankel2, besselj, bessely + + References + ========== + + .. [1] https://functions.wolfram.com/Bessel-TypeFunctions/HankelH1/ + + """ + + _a = S.One + _b = S.One + + def _eval_conjugate(self): + z = self.argument + if z.is_extended_negative is False: + return hankel2(self.order.conjugate(), z.conjugate()) + + +class hankel2(BesselBase): + r""" + Hankel function of the second kind. + + Explanation + =========== + + This function is defined as + + .. math :: + H_\nu^{(2)} = J_\nu(z) - iY_\nu(z), + + where $J_\nu(z)$ is the Bessel function of the first kind, and + $Y_\nu(z)$ is the Bessel function of the second kind. + + It is a solution to Bessel's equation, and linearly independent from + $H_\nu^{(1)}$. + + Examples + ======== + + >>> from sympy import hankel2 + >>> from sympy.abc import z, n + >>> hankel2(n, z).diff(z) + hankel2(n - 1, z)/2 - hankel2(n + 1, z)/2 + + See Also + ======== + + hankel1, besselj, bessely + + References + ========== + + .. [1] https://functions.wolfram.com/Bessel-TypeFunctions/HankelH2/ + + """ + + _a = S.One + _b = S.One + + def _eval_conjugate(self): + z = self.argument + if z.is_extended_negative is False: + return hankel1(self.order.conjugate(), z.conjugate()) + + +def assume_integer_order(fn): + @wraps(fn) + def g(self, nu, z): + if nu.is_integer: + return fn(self, nu, z) + return g + + +class SphericalBesselBase(BesselBase): + """ + Base class for spherical Bessel functions. + + These are thin wrappers around ordinary Bessel functions, + since spherical Bessel functions differ from the ordinary + ones just by a slight change in order. + + To use this class, define the ``_eval_evalf()`` and ``_expand()`` methods. + + """ + + def _expand(self, **hints): + """ Expand self into a polynomial. Nu is guaranteed to be Integer. """ + raise NotImplementedError('expansion') + + def _eval_expand_func(self, **hints): + if self.order.is_Integer: + return self._expand(**hints) + return self + + def fdiff(self, argindex=2): + if argindex != 2: + raise ArgumentIndexError(self, argindex) + return self.__class__(self.order - 1, self.argument) - \ + self * (self.order + 1)/self.argument + + +def _jn(n, z): + return (spherical_bessel_fn(n, z)*sin(z) + + S.NegativeOne**(n + 1)*spherical_bessel_fn(-n - 1, z)*cos(z)) + + +def _yn(n, z): + # (-1)**(n + 1) * _jn(-n - 1, z) + return (S.NegativeOne**(n + 1) * spherical_bessel_fn(-n - 1, z)*sin(z) - + spherical_bessel_fn(n, z)*cos(z)) + + +class jn(SphericalBesselBase): + r""" + Spherical Bessel function of the first kind. + + Explanation + =========== + + This function is a solution to the spherical Bessel equation + + .. math :: + z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2} + + 2z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 - \nu(\nu + 1)) w = 0. + + It can be defined as + + .. math :: + j_\nu(z) = \sqrt{\frac{\pi}{2z}} J_{\nu + \frac{1}{2}}(z), + + where $J_\nu(z)$ is the Bessel function of the first kind. + + The spherical Bessel functions of integral order are + calculated using the formula: + + .. math:: j_n(z) = f_n(z) \sin{z} + (-1)^{n+1} f_{-n-1}(z) \cos{z}, + + where the coefficients $f_n(z)$ are available as + :func:`sympy.polys.orthopolys.spherical_bessel_fn`. + + Examples + ======== + + >>> from sympy import Symbol, jn, sin, cos, expand_func, besselj, bessely + >>> z = Symbol("z") + >>> nu = Symbol("nu", integer=True) + >>> print(expand_func(jn(0, z))) + sin(z)/z + >>> expand_func(jn(1, z)) == sin(z)/z**2 - cos(z)/z + True + >>> expand_func(jn(3, z)) + (-6/z**2 + 15/z**4)*sin(z) + (1/z - 15/z**3)*cos(z) + >>> jn(nu, z).rewrite(besselj) + sqrt(2)*sqrt(pi)*sqrt(1/z)*besselj(nu + 1/2, z)/2 + >>> jn(nu, z).rewrite(bessely) + (-1)**nu*sqrt(2)*sqrt(pi)*sqrt(1/z)*bessely(-nu - 1/2, z)/2 + >>> jn(2, 5.2+0.3j).evalf(20) + 0.099419756723640344491 - 0.054525080242173562897*I + + See Also + ======== + + besselj, bessely, besselk, yn + + References + ========== + + .. [1] https://dlmf.nist.gov/10.47 + + """ + @classmethod + def eval(cls, nu, z): + if z.is_zero: + if nu.is_zero: + return S.One + elif nu.is_integer: + if nu.is_positive: + return S.Zero + else: + return S.ComplexInfinity + if z in (S.NegativeInfinity, S.Infinity): + return S.Zero + + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + return sqrt(pi/(2*z)) * besselj(nu + S.Half, z) + + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + return S.NegativeOne**nu * sqrt(pi/(2*z)) * bessely(-nu - S.Half, z) + + def _eval_rewrite_as_yn(self, nu, z, **kwargs): + return S.NegativeOne**(nu) * yn(-nu - 1, z) + + def _expand(self, **hints): + return _jn(self.order, self.argument) + + def _eval_evalf(self, prec): + if self.order.is_Integer: + return self.rewrite(besselj)._eval_evalf(prec) + + +class yn(SphericalBesselBase): + r""" + Spherical Bessel function of the second kind. + + Explanation + =========== + + This function is another solution to the spherical Bessel equation, and + linearly independent from $j_n$. It can be defined as + + .. math :: + y_\nu(z) = \sqrt{\frac{\pi}{2z}} Y_{\nu + \frac{1}{2}}(z), + + where $Y_\nu(z)$ is the Bessel function of the second kind. + + For integral orders $n$, $y_n$ is calculated using the formula: + + .. math:: y_n(z) = (-1)^{n+1} j_{-n-1}(z) + + Examples + ======== + + >>> from sympy import Symbol, yn, sin, cos, expand_func, besselj, bessely + >>> z = Symbol("z") + >>> nu = Symbol("nu", integer=True) + >>> print(expand_func(yn(0, z))) + -cos(z)/z + >>> expand_func(yn(1, z)) == -cos(z)/z**2-sin(z)/z + True + >>> yn(nu, z).rewrite(besselj) + (-1)**(nu + 1)*sqrt(2)*sqrt(pi)*sqrt(1/z)*besselj(-nu - 1/2, z)/2 + >>> yn(nu, z).rewrite(bessely) + sqrt(2)*sqrt(pi)*sqrt(1/z)*bessely(nu + 1/2, z)/2 + >>> yn(2, 5.2+0.3j).evalf(20) + 0.18525034196069722536 + 0.014895573969924817587*I + + See Also + ======== + + besselj, bessely, besselk, jn + + References + ========== + + .. [1] https://dlmf.nist.gov/10.47 + + """ + @assume_integer_order + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + return S.NegativeOne**(nu+1) * sqrt(pi/(2*z)) * besselj(-nu - S.Half, z) + + @assume_integer_order + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + return sqrt(pi/(2*z)) * bessely(nu + S.Half, z) + + def _eval_rewrite_as_jn(self, nu, z, **kwargs): + return S.NegativeOne**(nu + 1) * jn(-nu - 1, z) + + def _expand(self, **hints): + return _yn(self.order, self.argument) + + def _eval_evalf(self, prec): + if self.order.is_Integer: + return self.rewrite(bessely)._eval_evalf(prec) + + +class SphericalHankelBase(SphericalBesselBase): + + @assume_integer_order + def _eval_rewrite_as_besselj(self, nu, z, **kwargs): + # jn +- I*yn + # jn as beeselj: sqrt(pi/(2*z)) * besselj(nu + S.Half, z) + # yn as besselj: (-1)**(nu+1) * sqrt(pi/(2*z)) * besselj(-nu - S.Half, z) + hks = self._hankel_kind_sign + return sqrt(pi/(2*z))*(besselj(nu + S.Half, z) + + hks*I*S.NegativeOne**(nu+1)*besselj(-nu - S.Half, z)) + + @assume_integer_order + def _eval_rewrite_as_bessely(self, nu, z, **kwargs): + # jn +- I*yn + # jn as bessely: (-1)**nu * sqrt(pi/(2*z)) * bessely(-nu - S.Half, z) + # yn as bessely: sqrt(pi/(2*z)) * bessely(nu + S.Half, z) + hks = self._hankel_kind_sign + return sqrt(pi/(2*z))*(S.NegativeOne**nu*bessely(-nu - S.Half, z) + + hks*I*bessely(nu + S.Half, z)) + + def _eval_rewrite_as_yn(self, nu, z, **kwargs): + hks = self._hankel_kind_sign + return jn(nu, z).rewrite(yn) + hks*I*yn(nu, z) + + def _eval_rewrite_as_jn(self, nu, z, **kwargs): + hks = self._hankel_kind_sign + return jn(nu, z) + hks*I*yn(nu, z).rewrite(jn) + + def _eval_expand_func(self, **hints): + if self.order.is_Integer: + return self._expand(**hints) + else: + nu = self.order + z = self.argument + hks = self._hankel_kind_sign + return jn(nu, z) + hks*I*yn(nu, z) + + def _expand(self, **hints): + n = self.order + z = self.argument + hks = self._hankel_kind_sign + + # fully expanded version + # return ((fn(n, z) * sin(z) + + # (-1)**(n + 1) * fn(-n - 1, z) * cos(z)) + # jn + # (hks * I * (-1)**(n + 1) * + # (fn(-n - 1, z) * hk * I * sin(z) + + # (-1)**(-n) * fn(n, z) * I * cos(z))) # +-I*yn + # ) + + return (_jn(n, z) + hks*I*_yn(n, z)).expand() + + def _eval_evalf(self, prec): + if self.order.is_Integer: + return self.rewrite(besselj)._eval_evalf(prec) + + +class hn1(SphericalHankelBase): + r""" + Spherical Hankel function of the first kind. + + Explanation + =========== + + This function is defined as + + .. math:: h_\nu^(1)(z) = j_\nu(z) + i y_\nu(z), + + where $j_\nu(z)$ and $y_\nu(z)$ are the spherical + Bessel function of the first and second kinds. + + For integral orders $n$, $h_n^(1)$ is calculated using the formula: + + .. math:: h_n^(1)(z) = j_{n}(z) + i (-1)^{n+1} j_{-n-1}(z) + + Examples + ======== + + >>> from sympy import Symbol, hn1, hankel1, expand_func, yn, jn + >>> z = Symbol("z") + >>> nu = Symbol("nu", integer=True) + >>> print(expand_func(hn1(nu, z))) + jn(nu, z) + I*yn(nu, z) + >>> print(expand_func(hn1(0, z))) + sin(z)/z - I*cos(z)/z + >>> print(expand_func(hn1(1, z))) + -I*sin(z)/z - cos(z)/z + sin(z)/z**2 - I*cos(z)/z**2 + >>> hn1(nu, z).rewrite(jn) + (-1)**(nu + 1)*I*jn(-nu - 1, z) + jn(nu, z) + >>> hn1(nu, z).rewrite(yn) + (-1)**nu*yn(-nu - 1, z) + I*yn(nu, z) + >>> hn1(nu, z).rewrite(hankel1) + sqrt(2)*sqrt(pi)*sqrt(1/z)*hankel1(nu, z)/2 + + See Also + ======== + + hn2, jn, yn, hankel1, hankel2 + + References + ========== + + .. [1] https://dlmf.nist.gov/10.47 + + """ + + _hankel_kind_sign = S.One + + @assume_integer_order + def _eval_rewrite_as_hankel1(self, nu, z, **kwargs): + return sqrt(pi/(2*z))*hankel1(nu, z) + + +class hn2(SphericalHankelBase): + r""" + Spherical Hankel function of the second kind. + + Explanation + =========== + + This function is defined as + + .. math:: h_\nu^(2)(z) = j_\nu(z) - i y_\nu(z), + + where $j_\nu(z)$ and $y_\nu(z)$ are the spherical + Bessel function of the first and second kinds. + + For integral orders $n$, $h_n^(2)$ is calculated using the formula: + + .. math:: h_n^(2)(z) = j_{n} - i (-1)^{n+1} j_{-n-1}(z) + + Examples + ======== + + >>> from sympy import Symbol, hn2, hankel2, expand_func, jn, yn + >>> z = Symbol("z") + >>> nu = Symbol("nu", integer=True) + >>> print(expand_func(hn2(nu, z))) + jn(nu, z) - I*yn(nu, z) + >>> print(expand_func(hn2(0, z))) + sin(z)/z + I*cos(z)/z + >>> print(expand_func(hn2(1, z))) + I*sin(z)/z - cos(z)/z + sin(z)/z**2 + I*cos(z)/z**2 + >>> hn2(nu, z).rewrite(hankel2) + sqrt(2)*sqrt(pi)*sqrt(1/z)*hankel2(nu, z)/2 + >>> hn2(nu, z).rewrite(jn) + -(-1)**(nu + 1)*I*jn(-nu - 1, z) + jn(nu, z) + >>> hn2(nu, z).rewrite(yn) + (-1)**nu*yn(-nu - 1, z) - I*yn(nu, z) + + See Also + ======== + + hn1, jn, yn, hankel1, hankel2 + + References + ========== + + .. [1] https://dlmf.nist.gov/10.47 + + """ + + _hankel_kind_sign = -S.One + + @assume_integer_order + def _eval_rewrite_as_hankel2(self, nu, z, **kwargs): + return sqrt(pi/(2*z))*hankel2(nu, z) + + +def jn_zeros(n, k, method="sympy", dps=15): + """ + Zeros of the spherical Bessel function of the first kind. + + Explanation + =========== + + This returns an array of zeros of $jn$ up to the $k$-th zero. + + * method = "sympy": uses `mpmath.besseljzero + `_ + * method = "scipy": uses the + `SciPy's sph_jn `_ + and + `newton `_ + to find all + roots, which is faster than computing the zeros using a general + numerical solver, but it requires SciPy and only works with low + precision floating point numbers. (The function used with + method="sympy" is a recent addition to mpmath; before that a general + solver was used.) + + Examples + ======== + + >>> from sympy import jn_zeros + >>> jn_zeros(2, 4, dps=5) + [5.7635, 9.095, 12.323, 15.515] + + See Also + ======== + + jn, yn, besselj, besselk, bessely + + Parameters + ========== + + n : integer + order of Bessel function + + k : integer + number of zeros to return + + + """ + from math import pi as math_pi + + if method == "sympy": + from mpmath import besseljzero + from mpmath.libmp.libmpf import dps_to_prec + prec = dps_to_prec(dps) + return [Expr._from_mpmath(besseljzero(S(n + 0.5)._to_mpmath(prec), + int(l)), prec) + for l in range(1, k + 1)] + elif method == "scipy": + from scipy.optimize import newton + try: + from scipy.special import spherical_jn + f = lambda x: spherical_jn(n, x) + except ImportError: + from scipy.special import sph_jn + f = lambda x: sph_jn(n, x)[0][-1] + else: + raise NotImplementedError("Unknown method.") + + def solver(f, x): + if method == "scipy": + root = newton(f, x) + else: + raise NotImplementedError("Unknown method.") + return root + + # we need to approximate the position of the first root: + root = n + math_pi + # determine the first root exactly: + root = solver(f, root) + roots = [root] + for i in range(k - 1): + # estimate the position of the next root using the last root + pi: + root = solver(f, root + math_pi) + roots.append(root) + return roots + + +class AiryBase(DefinedFunction): + """ + Abstract base class for Airy functions. + + This class is meant to reduce code duplication. + + """ + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + def as_real_imag(self, deep=True, **hints): + z = self.args[0] + zc = z.conjugate() + f = self.func + u = (f(z)+f(zc))/2 + v = I*(f(zc)-f(z))/2 + return u, v + + def _eval_expand_complex(self, deep=True, **hints): + re_part, im_part = self.as_real_imag(deep=deep, **hints) + return re_part + im_part*I + + +class airyai(AiryBase): + r""" + The Airy function $\operatorname{Ai}$ of the first kind. + + Explanation + =========== + + The Airy function $\operatorname{Ai}(z)$ is defined to be the function + satisfying Airy's differential equation + + .. math:: + \frac{\mathrm{d}^2 w(z)}{\mathrm{d}z^2} - z w(z) = 0. + + Equivalently, for real $z$ + + .. math:: + \operatorname{Ai}(z) := \frac{1}{\pi} + \int_0^\infty \cos\left(\frac{t^3}{3} + z t\right) \mathrm{d}t. + + Examples + ======== + + Create an Airy function object: + + >>> from sympy import airyai + >>> from sympy.abc import z + + >>> airyai(z) + airyai(z) + + Several special values are known: + + >>> airyai(0) + 3**(1/3)/(3*gamma(2/3)) + >>> from sympy import oo + >>> airyai(oo) + 0 + >>> airyai(-oo) + 0 + + The Airy function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(airyai(z)) + airyai(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(airyai(z), z) + airyaiprime(z) + >>> diff(airyai(z), z, 2) + z*airyai(z) + + Series expansion is also supported: + + >>> from sympy import series + >>> series(airyai(z), z, 0, 3) + 3**(5/6)*gamma(1/3)/(6*pi) - 3**(1/6)*z*gamma(2/3)/(2*pi) + O(z**3) + + We can numerically evaluate the Airy function to arbitrary precision + on the whole complex plane: + + >>> airyai(-2).evalf(50) + 0.22740742820168557599192443603787379946077222541710 + + Rewrite $\operatorname{Ai}(z)$ in terms of hypergeometric functions: + + >>> from sympy import hyper + >>> airyai(z).rewrite(hyper) + -3**(2/3)*z*hyper((), (4/3,), z**3/9)/(3*gamma(1/3)) + 3**(1/3)*hyper((), (2/3,), z**3/9)/(3*gamma(2/3)) + + See Also + ======== + + airybi: Airy function of the second kind. + airyaiprime: Derivative of the Airy function of the first kind. + airybiprime: Derivative of the Airy function of the second kind. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Airy_function + .. [2] https://dlmf.nist.gov/9 + .. [3] https://encyclopediaofmath.org/wiki/Airy_functions + .. [4] https://mathworld.wolfram.com/AiryFunctions.html + + """ + + nargs = 1 + unbranched = True + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return S.One / (3**Rational(2, 3) * gamma(Rational(2, 3))) + if arg.is_zero: + return S.One / (3**Rational(2, 3) * gamma(Rational(2, 3))) + + def fdiff(self, argindex=1): + if argindex == 1: + return airyaiprime(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 1: + p = previous_terms[-1] + return ((cbrt(3)*x)**(-n)*(cbrt(3)*x)**(n + 1)*sin(pi*(n*Rational(2, 3) + Rational(4, 3)))*factorial(n) * + gamma(n/3 + Rational(2, 3))/(sin(pi*(n*Rational(2, 3) + Rational(2, 3)))*factorial(n + 1)*gamma(n/3 + Rational(1, 3))) * p) + else: + return (S.One/(3**Rational(2, 3)*pi) * gamma((n+S.One)/S(3)) * sin(Rational(2, 3)*pi*(n+S.One)) / + factorial(n) * (cbrt(3)*x)**n) + + def _eval_rewrite_as_besselj(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = Pow(-z, Rational(3, 2)) + if re(z).is_negative: + return ot*sqrt(-z) * (besselj(-ot, tt*a) + besselj(ot, tt*a)) + + def _eval_rewrite_as_besseli(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = Pow(z, Rational(3, 2)) + if re(z).is_positive: + return ot*sqrt(z) * (besseli(-ot, tt*a) - besseli(ot, tt*a)) + else: + return ot*(Pow(a, ot)*besseli(-ot, tt*a) - z*Pow(a, -ot)*besseli(ot, tt*a)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + pf1 = S.One / (3**Rational(2, 3)*gamma(Rational(2, 3))) + pf2 = z / (root(3, 3)*gamma(Rational(1, 3))) + return pf1 * hyper([], [Rational(2, 3)], z**3/9) - pf2 * hyper([], [Rational(4, 3)], z**3/9) + + def _eval_expand_func(self, **hints): + arg = self.args[0] + symbs = arg.free_symbols + + if len(symbs) == 1: + z = symbs.pop() + c = Wild("c", exclude=[z]) + d = Wild("d", exclude=[z]) + m = Wild("m", exclude=[z]) + n = Wild("n", exclude=[z]) + M = arg.match(c*(d*z**n)**m) + if M is not None: + m = M[m] + # The transformation is given by 03.05.16.0001.01 + # https://functions.wolfram.com/Bessel-TypeFunctions/AiryAi/16/01/01/0001/ + if (3*m).is_integer: + c = M[c] + d = M[d] + n = M[n] + pf = (d * z**n)**m / (d**m * z**(m*n)) + newarg = c * d**m * z**(m*n) + return S.Half * ((pf + S.One)*airyai(newarg) - (pf - S.One)/sqrt(3)*airybi(newarg)) + + +class airybi(AiryBase): + r""" + The Airy function $\operatorname{Bi}$ of the second kind. + + Explanation + =========== + + The Airy function $\operatorname{Bi}(z)$ is defined to be the function + satisfying Airy's differential equation + + .. math:: + \frac{\mathrm{d}^2 w(z)}{\mathrm{d}z^2} - z w(z) = 0. + + Equivalently, for real $z$ + + .. math:: + \operatorname{Bi}(z) := \frac{1}{\pi} + \int_0^\infty + \exp\left(-\frac{t^3}{3} + z t\right) + + \sin\left(\frac{t^3}{3} + z t\right) \mathrm{d}t. + + Examples + ======== + + Create an Airy function object: + + >>> from sympy import airybi + >>> from sympy.abc import z + + >>> airybi(z) + airybi(z) + + Several special values are known: + + >>> airybi(0) + 3**(5/6)/(3*gamma(2/3)) + >>> from sympy import oo + >>> airybi(oo) + oo + >>> airybi(-oo) + 0 + + The Airy function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(airybi(z)) + airybi(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(airybi(z), z) + airybiprime(z) + >>> diff(airybi(z), z, 2) + z*airybi(z) + + Series expansion is also supported: + + >>> from sympy import series + >>> series(airybi(z), z, 0, 3) + 3**(1/3)*gamma(1/3)/(2*pi) + 3**(2/3)*z*gamma(2/3)/(2*pi) + O(z**3) + + We can numerically evaluate the Airy function to arbitrary precision + on the whole complex plane: + + >>> airybi(-2).evalf(50) + -0.41230258795639848808323405461146104203453483447240 + + Rewrite $\operatorname{Bi}(z)$ in terms of hypergeometric functions: + + >>> from sympy import hyper + >>> airybi(z).rewrite(hyper) + 3**(1/6)*z*hyper((), (4/3,), z**3/9)/gamma(1/3) + 3**(5/6)*hyper((), (2/3,), z**3/9)/(3*gamma(2/3)) + + See Also + ======== + + airyai: Airy function of the first kind. + airyaiprime: Derivative of the Airy function of the first kind. + airybiprime: Derivative of the Airy function of the second kind. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Airy_function + .. [2] https://dlmf.nist.gov/9 + .. [3] https://encyclopediaofmath.org/wiki/Airy_functions + .. [4] https://mathworld.wolfram.com/AiryFunctions.html + + """ + + nargs = 1 + unbranched = True + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return S.One / (3**Rational(1, 6) * gamma(Rational(2, 3))) + + if arg.is_zero: + return S.One / (3**Rational(1, 6) * gamma(Rational(2, 3))) + + def fdiff(self, argindex=1): + if argindex == 1: + return airybiprime(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 1: + p = previous_terms[-1] + return (cbrt(3)*x * Abs(sin(Rational(2, 3)*pi*(n + S.One))) * factorial((n - S.One)/S(3)) / + ((n + S.One) * Abs(cos(Rational(2, 3)*pi*(n + S.Half))) * factorial((n - 2)/S(3))) * p) + else: + return (S.One/(root(3, 6)*pi) * gamma((n + S.One)/S(3)) * Abs(sin(Rational(2, 3)*pi*(n + S.One))) / + factorial(n) * (cbrt(3)*x)**n) + + def _eval_rewrite_as_besselj(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = Pow(-z, Rational(3, 2)) + if re(z).is_negative: + return sqrt(-z/3) * (besselj(-ot, tt*a) - besselj(ot, tt*a)) + + def _eval_rewrite_as_besseli(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = Pow(z, Rational(3, 2)) + if re(z).is_positive: + return sqrt(z)/sqrt(3) * (besseli(-ot, tt*a) + besseli(ot, tt*a)) + else: + b = Pow(a, ot) + c = Pow(a, -ot) + return sqrt(ot)*(b*besseli(-ot, tt*a) + z*c*besseli(ot, tt*a)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + pf1 = S.One / (root(3, 6)*gamma(Rational(2, 3))) + pf2 = z*root(3, 6) / gamma(Rational(1, 3)) + return pf1 * hyper([], [Rational(2, 3)], z**3/9) + pf2 * hyper([], [Rational(4, 3)], z**3/9) + + def _eval_expand_func(self, **hints): + arg = self.args[0] + symbs = arg.free_symbols + + if len(symbs) == 1: + z = symbs.pop() + c = Wild("c", exclude=[z]) + d = Wild("d", exclude=[z]) + m = Wild("m", exclude=[z]) + n = Wild("n", exclude=[z]) + M = arg.match(c*(d*z**n)**m) + if M is not None: + m = M[m] + # The transformation is given by 03.06.16.0001.01 + # https://functions.wolfram.com/Bessel-TypeFunctions/AiryBi/16/01/01/0001/ + if (3*m).is_integer: + c = M[c] + d = M[d] + n = M[n] + pf = (d * z**n)**m / (d**m * z**(m*n)) + newarg = c * d**m * z**(m*n) + return S.Half * (sqrt(3)*(S.One - pf)*airyai(newarg) + (S.One + pf)*airybi(newarg)) + + +class airyaiprime(AiryBase): + r""" + The derivative $\operatorname{Ai}^\prime$ of the Airy function of the first + kind. + + Explanation + =========== + + The Airy function $\operatorname{Ai}^\prime(z)$ is defined to be the + function + + .. math:: + \operatorname{Ai}^\prime(z) := \frac{\mathrm{d} \operatorname{Ai}(z)}{\mathrm{d} z}. + + Examples + ======== + + Create an Airy function object: + + >>> from sympy import airyaiprime + >>> from sympy.abc import z + + >>> airyaiprime(z) + airyaiprime(z) + + Several special values are known: + + >>> airyaiprime(0) + -3**(2/3)/(3*gamma(1/3)) + >>> from sympy import oo + >>> airyaiprime(oo) + 0 + + The Airy function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(airyaiprime(z)) + airyaiprime(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(airyaiprime(z), z) + z*airyai(z) + >>> diff(airyaiprime(z), z, 2) + z*airyaiprime(z) + airyai(z) + + Series expansion is also supported: + + >>> from sympy import series + >>> series(airyaiprime(z), z, 0, 3) + -3**(2/3)/(3*gamma(1/3)) + 3**(1/3)*z**2/(6*gamma(2/3)) + O(z**3) + + We can numerically evaluate the Airy function to arbitrary precision + on the whole complex plane: + + >>> airyaiprime(-2).evalf(50) + 0.61825902074169104140626429133247528291577794512415 + + Rewrite $\operatorname{Ai}^\prime(z)$ in terms of hypergeometric functions: + + >>> from sympy import hyper + >>> airyaiprime(z).rewrite(hyper) + 3**(1/3)*z**2*hyper((), (5/3,), z**3/9)/(6*gamma(2/3)) - 3**(2/3)*hyper((), (1/3,), z**3/9)/(3*gamma(1/3)) + + See Also + ======== + + airyai: Airy function of the first kind. + airybi: Airy function of the second kind. + airybiprime: Derivative of the Airy function of the second kind. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Airy_function + .. [2] https://dlmf.nist.gov/9 + .. [3] https://encyclopediaofmath.org/wiki/Airy_functions + .. [4] https://mathworld.wolfram.com/AiryFunctions.html + + """ + + nargs = 1 + unbranched = True + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + + if arg.is_zero: + return S.NegativeOne / (3**Rational(1, 3) * gamma(Rational(1, 3))) + + def fdiff(self, argindex=1): + if argindex == 1: + return self.args[0]*airyai(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_evalf(self, prec): + z = self.args[0]._to_mpmath(prec) + with workprec(prec): + res = mp.airyai(z, derivative=1) + return Expr._from_mpmath(res, prec) + + def _eval_rewrite_as_besselj(self, z, **kwargs): + tt = Rational(2, 3) + a = Pow(-z, Rational(3, 2)) + if re(z).is_negative: + return z/3 * (besselj(-tt, tt*a) - besselj(tt, tt*a)) + + def _eval_rewrite_as_besseli(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = tt * Pow(z, Rational(3, 2)) + if re(z).is_positive: + return z/3 * (besseli(tt, a) - besseli(-tt, a)) + else: + a = Pow(z, Rational(3, 2)) + b = Pow(a, tt) + c = Pow(a, -tt) + return ot * (z**2*c*besseli(tt, tt*a) - b*besseli(-ot, tt*a)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + pf1 = z**2 / (2*3**Rational(2, 3)*gamma(Rational(2, 3))) + pf2 = 1 / (root(3, 3)*gamma(Rational(1, 3))) + return pf1 * hyper([], [Rational(5, 3)], z**3/9) - pf2 * hyper([], [Rational(1, 3)], z**3/9) + + def _eval_expand_func(self, **hints): + arg = self.args[0] + symbs = arg.free_symbols + + if len(symbs) == 1: + z = symbs.pop() + c = Wild("c", exclude=[z]) + d = Wild("d", exclude=[z]) + m = Wild("m", exclude=[z]) + n = Wild("n", exclude=[z]) + M = arg.match(c*(d*z**n)**m) + if M is not None: + m = M[m] + # The transformation is in principle + # given by 03.07.16.0001.01 but note + # that there is an error in this formula. + # https://functions.wolfram.com/Bessel-TypeFunctions/AiryAiPrime/16/01/01/0001/ + if (3*m).is_integer: + c = M[c] + d = M[d] + n = M[n] + pf = (d**m * z**(n*m)) / (d * z**n)**m + newarg = c * d**m * z**(n*m) + return S.Half * ((pf + S.One)*airyaiprime(newarg) + (pf - S.One)/sqrt(3)*airybiprime(newarg)) + + +class airybiprime(AiryBase): + r""" + The derivative $\operatorname{Bi}^\prime$ of the Airy function of the first + kind. + + Explanation + =========== + + The Airy function $\operatorname{Bi}^\prime(z)$ is defined to be the + function + + .. math:: + \operatorname{Bi}^\prime(z) := \frac{\mathrm{d} \operatorname{Bi}(z)}{\mathrm{d} z}. + + Examples + ======== + + Create an Airy function object: + + >>> from sympy import airybiprime + >>> from sympy.abc import z + + >>> airybiprime(z) + airybiprime(z) + + Several special values are known: + + >>> airybiprime(0) + 3**(1/6)/gamma(1/3) + >>> from sympy import oo + >>> airybiprime(oo) + oo + >>> airybiprime(-oo) + 0 + + The Airy function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(airybiprime(z)) + airybiprime(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(airybiprime(z), z) + z*airybi(z) + >>> diff(airybiprime(z), z, 2) + z*airybiprime(z) + airybi(z) + + Series expansion is also supported: + + >>> from sympy import series + >>> series(airybiprime(z), z, 0, 3) + 3**(1/6)/gamma(1/3) + 3**(5/6)*z**2/(6*gamma(2/3)) + O(z**3) + + We can numerically evaluate the Airy function to arbitrary precision + on the whole complex plane: + + >>> airybiprime(-2).evalf(50) + 0.27879516692116952268509756941098324140300059345163 + + Rewrite $\operatorname{Bi}^\prime(z)$ in terms of hypergeometric functions: + + >>> from sympy import hyper + >>> airybiprime(z).rewrite(hyper) + 3**(5/6)*z**2*hyper((), (5/3,), z**3/9)/(6*gamma(2/3)) + 3**(1/6)*hyper((), (1/3,), z**3/9)/gamma(1/3) + + See Also + ======== + + airyai: Airy function of the first kind. + airybi: Airy function of the second kind. + airyaiprime: Derivative of the Airy function of the first kind. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Airy_function + .. [2] https://dlmf.nist.gov/9 + .. [3] https://encyclopediaofmath.org/wiki/Airy_functions + .. [4] https://mathworld.wolfram.com/AiryFunctions.html + + """ + + nargs = 1 + unbranched = True + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Infinity + elif arg is S.NegativeInfinity: + return S.Zero + elif arg.is_zero: + return 3**Rational(1, 6) / gamma(Rational(1, 3)) + + if arg.is_zero: + return 3**Rational(1, 6) / gamma(Rational(1, 3)) + + + def fdiff(self, argindex=1): + if argindex == 1: + return self.args[0]*airybi(self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_evalf(self, prec): + z = self.args[0]._to_mpmath(prec) + with workprec(prec): + res = mp.airybi(z, derivative=1) + return Expr._from_mpmath(res, prec) + + def _eval_rewrite_as_besselj(self, z, **kwargs): + tt = Rational(2, 3) + a = tt * Pow(-z, Rational(3, 2)) + if re(z).is_negative: + return -z/sqrt(3) * (besselj(-tt, a) + besselj(tt, a)) + + def _eval_rewrite_as_besseli(self, z, **kwargs): + ot = Rational(1, 3) + tt = Rational(2, 3) + a = tt * Pow(z, Rational(3, 2)) + if re(z).is_positive: + return z/sqrt(3) * (besseli(-tt, a) + besseli(tt, a)) + else: + a = Pow(z, Rational(3, 2)) + b = Pow(a, tt) + c = Pow(a, -tt) + return sqrt(ot) * (b*besseli(-tt, tt*a) + z**2*c*besseli(tt, tt*a)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + pf1 = z**2 / (2*root(3, 6)*gamma(Rational(2, 3))) + pf2 = root(3, 6) / gamma(Rational(1, 3)) + return pf1 * hyper([], [Rational(5, 3)], z**3/9) + pf2 * hyper([], [Rational(1, 3)], z**3/9) + + def _eval_expand_func(self, **hints): + arg = self.args[0] + symbs = arg.free_symbols + + if len(symbs) == 1: + z = symbs.pop() + c = Wild("c", exclude=[z]) + d = Wild("d", exclude=[z]) + m = Wild("m", exclude=[z]) + n = Wild("n", exclude=[z]) + M = arg.match(c*(d*z**n)**m) + if M is not None: + m = M[m] + # The transformation is in principle + # given by 03.08.16.0001.01 but note + # that there is an error in this formula. + # https://functions.wolfram.com/Bessel-TypeFunctions/AiryBiPrime/16/01/01/0001/ + if (3*m).is_integer: + c = M[c] + d = M[d] + n = M[n] + pf = (d**m * z**(n*m)) / (d * z**n)**m + newarg = c * d**m * z**(n*m) + return S.Half * (sqrt(3)*(pf - S.One)*airyaiprime(newarg) + (pf + S.One)*airybiprime(newarg)) + + +class marcumq(DefinedFunction): + r""" + The Marcum Q-function. + + Explanation + =========== + + The Marcum Q-function is defined by the meromorphic continuation of + + .. math:: + Q_m(a, b) = a^{- m + 1} \int_{b}^{\infty} x^{m} e^{- \frac{a^{2}}{2} - \frac{x^{2}}{2}} I_{m - 1}\left(a x\right)\, dx + + Examples + ======== + + >>> from sympy import marcumq + >>> from sympy.abc import m, a, b + >>> marcumq(m, a, b) + marcumq(m, a, b) + + Special values: + + >>> marcumq(m, 0, b) + uppergamma(m, b**2/2)/gamma(m) + >>> marcumq(0, 0, 0) + 0 + >>> marcumq(0, a, 0) + 1 - exp(-a**2/2) + >>> marcumq(1, a, a) + 1/2 + exp(-a**2)*besseli(0, a**2)/2 + >>> marcumq(2, a, a) + 1/2 + exp(-a**2)*besseli(0, a**2)/2 + exp(-a**2)*besseli(1, a**2) + + Differentiation with respect to $a$ and $b$ is supported: + + >>> from sympy import diff + >>> diff(marcumq(m, a, b), a) + a*(-marcumq(m, a, b) + marcumq(m + 1, a, b)) + >>> diff(marcumq(m, a, b), b) + -a**(1 - m)*b**m*exp(-a**2/2 - b**2/2)*besseli(m - 1, a*b) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Marcum_Q-function + .. [2] https://mathworld.wolfram.com/MarcumQ-Function.html + + """ + + @classmethod + def eval(cls, m, a, b): + if a is S.Zero: + if m is S.Zero and b is S.Zero: + return S.Zero + return uppergamma(m, b**2 * S.Half) / gamma(m) + + if m is S.Zero and b is S.Zero: + return 1 - 1 / exp(a**2 * S.Half) + + if a == b: + if m is S.One: + return (1 + exp(-a**2) * besseli(0, a**2))*S.Half + if m == 2: + return S.Half + S.Half * exp(-a**2) * besseli(0, a**2) + exp(-a**2) * besseli(1, a**2) + + if a.is_zero: + if m.is_zero and b.is_zero: + return S.Zero + return uppergamma(m, b**2*S.Half) / gamma(m) + + if m.is_zero and b.is_zero: + return 1 - 1 / exp(a**2*S.Half) + + def fdiff(self, argindex=2): + m, a, b = self.args + if argindex == 2: + return a * (-marcumq(m, a, b) + marcumq(1+m, a, b)) + elif argindex == 3: + return (-b**m / a**(m-1)) * exp(-(a**2 + b**2)/2) * besseli(m-1, a*b) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Integral(self, m, a, b, **kwargs): + from sympy.integrals.integrals import Integral + x = kwargs.get('x', Dummy(uniquely_named_symbol('x').name)) + return a ** (1 - m) * \ + Integral(x**m * exp(-(x**2 + a**2)/2) * besseli(m-1, a*x), [x, b, S.Infinity]) + + def _eval_rewrite_as_Sum(self, m, a, b, **kwargs): + from sympy.concrete.summations import Sum + k = kwargs.get('k', Dummy('k')) + return exp(-(a**2 + b**2) / 2) * Sum((a/b)**k * besseli(k, a*b), [k, 1-m, S.Infinity]) + + def _eval_rewrite_as_besseli(self, m, a, b, **kwargs): + if a == b: + if m == 1: + return (1 + exp(-a**2) * besseli(0, a**2)) / 2 + if m.is_Integer and m >= 2: + s = sum(besseli(i, a**2) for i in range(1, m)) + return S.Half + exp(-a**2) * besseli(0, a**2) / 2 + exp(-a**2) * s + + def _eval_is_zero(self): + if all(arg.is_zero for arg in self.args): + return True + +class _besseli(DefinedFunction): + """ + Helper function to make the $\\mathrm{besseli}(nu, z)$ + function tractable for the Gruntz algorithm. + + """ + + def _eval_aseries(self, n, args0, x, logx): + from sympy.functions.combinatorial.factorials import RisingFactorial + from sympy.series.order import Order + point = args0[1] + + if point in [S.Infinity, S.NegativeInfinity]: + nu, z = self.args + l = [((RisingFactorial(Rational(2*nu - 1, 2), k)*RisingFactorial( + Rational(2*nu + 1, 2), k))/((2)**(k)*z**(Rational(2*k + 1, 2))*factorial(k))) for k in range(n)] + return sqrt(pi/(2))*(Add(*l)) + Order(1/z**(Rational(2*n + 1, 2)), x) + + return super()._eval_aseries(n, args0, x, logx) + + def _eval_rewrite_as_intractable(self, nu, z, **kwargs): + return exp(-z)*besseli(nu, z) + + def _eval_nseries(self, x, n, logx, cdir=0): + x0 = self.args[0].limit(x, 0) + if x0.is_zero: + f = self._eval_rewrite_as_intractable(*self.args) + return f._eval_nseries(x, n, logx) + return super()._eval_nseries(x, n, logx) + + +class _besselk(DefinedFunction): + """ + Helper function to make the $\\mathrm{besselk}(nu, z)$ + function tractable for the Gruntz algorithm. + + """ + + def _eval_aseries(self, n, args0, x, logx): + from sympy.functions.combinatorial.factorials import RisingFactorial + from sympy.series.order import Order + point = args0[1] + + if point in [S.Infinity, S.NegativeInfinity]: + nu, z = self.args + l = [((RisingFactorial(Rational(2*nu - 1, 2), k)*RisingFactorial( + Rational(2*nu + 1, 2), k))/((-2)**(k)*z**(Rational(2*k + 1, 2))*factorial(k))) for k in range(n)] + return sqrt(pi/(2))*(Add(*l)) + Order(1/z**(Rational(2*n + 1, 2)), x) + + return super()._eval_aseries(n, args0, x, logx) + + def _eval_rewrite_as_intractable(self,nu, z, **kwargs): + return exp(z)*besselk(nu, z) + + def _eval_nseries(self, x, n, logx, cdir=0): + x0 = self.args[0].limit(x, 0) + if x0.is_zero: + f = self._eval_rewrite_as_intractable(*self.args) + return f._eval_nseries(x, n, logx) + return super()._eval_nseries(x, n, logx) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/error_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/error_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..a778127d8b80583a892285fadbb8230f72de39f9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/error_functions.py @@ -0,0 +1,2801 @@ +""" This module contains various functions that are special cases + of incomplete gamma functions. It should probably be renamed. """ + +from sympy.core import EulerGamma # Must be imported from core, not core.numbers +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.function import DefinedFunction, ArgumentIndexError, expand_mul +from sympy.core.logic import fuzzy_or +from sympy.core.numbers import I, pi, Rational, Integer +from sympy.core.relational import is_eq +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Dummy, uniquely_named_symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial, factorial2, RisingFactorial +from sympy.functions.elementary.complexes import polar_lift, re, unpolarify +from sympy.functions.elementary.integers import ceiling, floor +from sympy.functions.elementary.miscellaneous import sqrt, root +from sympy.functions.elementary.exponential import exp, log, exp_polar +from sympy.functions.elementary.hyperbolic import cosh, sinh +from sympy.functions.elementary.trigonometric import cos, sin, sinc +from sympy.functions.special.hyper import hyper, meijerg + +# TODO series expansions +# TODO see the "Note:" in Ei + +# Helper function +def real_to_real_as_real_imag(self, deep=True, **hints): + if self.args[0].is_extended_real: + if deep: + hints['complex'] = False + return (self.expand(deep, **hints), S.Zero) + else: + return (self, S.Zero) + if deep: + x, y = self.args[0].expand(deep, **hints).as_real_imag() + else: + x, y = self.args[0].as_real_imag() + re = (self.func(x + I*y) + self.func(x - I*y))/2 + im = (self.func(x + I*y) - self.func(x - I*y))/(2*I) + return (re, im) + + +############################################################################### +################################ ERROR FUNCTION ############################### +############################################################################### + + +class erf(DefinedFunction): + r""" + The Gauss error function. + + Explanation + =========== + + This function is defined as: + + .. math :: + \mathrm{erf}(x) = \frac{2}{\sqrt{\pi}} \int_0^x e^{-t^2} \mathrm{d}t. + + Examples + ======== + + >>> from sympy import I, oo, erf + >>> from sympy.abc import z + + Several special values are known: + + >>> erf(0) + 0 + >>> erf(oo) + 1 + >>> erf(-oo) + -1 + >>> erf(I*oo) + oo*I + >>> erf(-I*oo) + -oo*I + + In general one can pull out factors of -1 and $I$ from the argument: + + >>> erf(-z) + -erf(z) + + The error function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(erf(z)) + erf(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(erf(z), z) + 2*exp(-z**2)/sqrt(pi) + + We can numerically evaluate the error function to arbitrary precision + on the whole complex plane: + + >>> erf(4).evalf(30) + 0.999999984582742099719981147840 + + >>> erf(-4*I).evalf(30) + -1296959.73071763923152794095062*I + + See Also + ======== + + erfc: Complementary error function. + erfi: Imaginary error function. + erf2: Two-argument error function. + erfinv: Inverse error function. + erfcinv: Inverse Complementary error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Error_function + .. [2] https://dlmf.nist.gov/7 + .. [3] https://mathworld.wolfram.com/Erf.html + .. [4] https://functions.wolfram.com/GammaBetaErf/Erf + + """ + + unbranched = True + + def fdiff(self, argindex=1): + if argindex == 1: + return 2*exp(-self.args[0]**2)/sqrt(pi) + else: + raise ArgumentIndexError(self, argindex) + + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + + """ + return erfinv + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.One + elif arg is S.NegativeInfinity: + return S.NegativeOne + elif arg.is_zero: + return S.Zero + + if isinstance(arg, erfinv): + return arg.args[0] + + if isinstance(arg, erfcinv): + return S.One - arg.args[0] + + if arg.is_zero: + return S.Zero + + # Only happens with unevaluated erf2inv + if isinstance(arg, erf2inv) and arg.args[0].is_zero: + return arg.args[1] + + # Try to pull out factors of I + t = arg.extract_multiplicatively(I) + if t in (S.Infinity, S.NegativeInfinity): + return arg + + # Try to pull out factors of -1 + if arg.could_extract_minus_sign(): + return -cls(-arg) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + k = floor((n - 1)/S(2)) + if len(previous_terms) > 2: + return -previous_terms[-2] * x**2 * (n - 2)/(n*k) + else: + return 2*S.NegativeOne**k * x**n/(n*factorial(k)*sqrt(pi)) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def _eval_is_real(self): + if self.args[0].is_extended_real is True: + return True + # There are cases where erf(z) becomes a real number + # even if z is a complex number + + def _eval_is_imaginary(self): + if self.args[0].is_imaginary is True: + return True + + def _eval_is_finite(self): + z = self.args[0] + return fuzzy_or([z.is_finite, z.is_extended_real]) + + def _eval_is_zero(self): + if self.args[0].is_extended_real is True: + return self.args[0].is_zero + + def _eval_is_positive(self): + if self.args[0].is_extended_real is True: + return self.args[0].is_extended_positive + + def _eval_is_negative(self): + if self.args[0].is_extended_real is True: + return self.args[0].is_extended_negative + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return sqrt(z**2)/z*(S.One - uppergamma(S.Half, z**2)/sqrt(pi)) + + def _eval_rewrite_as_fresnels(self, z, **kwargs): + arg = (S.One - I)*z/sqrt(pi) + return (S.One + I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_fresnelc(self, z, **kwargs): + arg = (S.One - I)*z/sqrt(pi) + return (S.One + I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], -z**2) + + def _eval_rewrite_as_expint(self, z, **kwargs): + return sqrt(z**2)/z - z*expint(S.Half, z**2)/sqrt(pi) + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + from sympy.series.limits import limit + if limitvar: + lim = limit(z, limitvar, S.Infinity) + if lim is S.NegativeInfinity: + return S.NegativeOne + _erfs(-z)*exp(-z**2) + return S.One - _erfs(z)*exp(-z**2) + + def _eval_rewrite_as_erfc(self, z, **kwargs): + return S.One - erfc(z) + + def _eval_rewrite_as_erfi(self, z, **kwargs): + return -I*erfi(I*z) + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.ComplexInfinity: + arg0 = arg.limit(x, 0, dir='-' if cdir == -1 else '+') + if x in arg.free_symbols and arg0.is_zero: + return 2*arg/sqrt(pi) + else: + return self.func(arg0) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + if point in [S.Infinity, S.NegativeInfinity]: + z = self.args[0] + + try: + _, ex = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + ex = -ex # as x->1/x for aseries + if ex.is_positive: + newn = ceiling(n/ex) + s = [S.NegativeOne**k * factorial2(2*k - 1) / (z**(2*k + 1) * 2**k) + for k in range(newn)] + [Order(1/z**newn, x)] + return S.One - (exp(-z**2)/sqrt(pi)) * Add(*s) + + return super(erf, self)._eval_aseries(n, args0, x, logx) + + as_real_imag = real_to_real_as_real_imag + + +class erfc(DefinedFunction): + r""" + Complementary Error Function. + + Explanation + =========== + + The function is defined as: + + .. math :: + \mathrm{erfc}(x) = \frac{2}{\sqrt{\pi}} \int_x^\infty e^{-t^2} \mathrm{d}t + + Examples + ======== + + >>> from sympy import I, oo, erfc + >>> from sympy.abc import z + + Several special values are known: + + >>> erfc(0) + 1 + >>> erfc(oo) + 0 + >>> erfc(-oo) + 2 + >>> erfc(I*oo) + -oo*I + >>> erfc(-I*oo) + oo*I + + The error function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(erfc(z)) + erfc(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(erfc(z), z) + -2*exp(-z**2)/sqrt(pi) + + It also follows + + >>> erfc(-z) + 2 - erfc(z) + + We can numerically evaluate the complementary error function to arbitrary + precision on the whole complex plane: + + >>> erfc(4).evalf(30) + 0.0000000154172579002800188521596734869 + + >>> erfc(4*I).evalf(30) + 1.0 - 1296959.73071763923152794095062*I + + See Also + ======== + + erf: Gaussian error function. + erfi: Imaginary error function. + erf2: Two-argument error function. + erfinv: Inverse error function. + erfcinv: Inverse Complementary error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Error_function + .. [2] https://dlmf.nist.gov/7 + .. [3] https://mathworld.wolfram.com/Erfc.html + .. [4] https://functions.wolfram.com/GammaBetaErf/Erfc + + """ + + unbranched = True + + def fdiff(self, argindex=1): + if argindex == 1: + return -2*exp(-self.args[0]**2)/sqrt(pi) + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + + """ + return erfcinv + + @classmethod + def eval(cls, arg): + if arg.is_Number: + if arg is S.NaN: + return S.NaN + elif arg is S.Infinity: + return S.Zero + elif arg.is_zero: + return S.One + + if isinstance(arg, erfinv): + return S.One - arg.args[0] + + if isinstance(arg, erfcinv): + return arg.args[0] + + if arg.is_zero: + return S.One + + # Try to pull out factors of I + t = arg.extract_multiplicatively(I) + if t in (S.Infinity, S.NegativeInfinity): + return -arg + + # Try to pull out factors of -1 + if arg.could_extract_minus_sign(): + return 2 - cls(-arg) + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n == 0: + return S.One + elif n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + k = floor((n - 1)/S(2)) + if len(previous_terms) > 2: + return -previous_terms[-2] * x**2 * (n - 2)/(n*k) + else: + return -2*S.NegativeOne**k * x**n/(n*factorial(k)*sqrt(pi)) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def _eval_is_real(self): + if self.args[0].is_extended_real is True: + return True + if self.args[0].is_imaginary is True: + return False + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + return self.rewrite(erf).rewrite("tractable", deep=True, limitvar=limitvar) + + def _eval_rewrite_as_erf(self, z, **kwargs): + return S.One - erf(z) + + def _eval_rewrite_as_erfi(self, z, **kwargs): + return S.One + I*erfi(I*z) + + def _eval_rewrite_as_fresnels(self, z, **kwargs): + arg = (S.One - I)*z/sqrt(pi) + return S.One - (S.One + I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_fresnelc(self, z, **kwargs): + arg = (S.One-I)*z/sqrt(pi) + return S.One - (S.One + I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return S.One - z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return S.One - 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], -z**2) + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return S.One - sqrt(z**2)/z*(S.One - uppergamma(S.Half, z**2)/sqrt(pi)) + + def _eval_rewrite_as_expint(self, z, **kwargs): + return S.One - sqrt(z**2)/z + z*expint(S.Half, z**2)/sqrt(pi) + + def _eval_expand_func(self, **hints): + return self.rewrite(erf) + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.ComplexInfinity: + arg0 = arg.limit(x, 0, dir='-' if cdir == -1 else '+') + if arg0.is_zero: + return S.One + else: + return self.func(arg0) + + as_real_imag = real_to_real_as_real_imag + + def _eval_aseries(self, n, args0, x, logx): + return S.One - erf(*self.args)._eval_aseries(n, args0, x, logx) + + +class erfi(DefinedFunction): + r""" + Imaginary error function. + + Explanation + =========== + + The function erfi is defined as: + + .. math :: + \mathrm{erfi}(x) = \frac{2}{\sqrt{\pi}} \int_0^x e^{t^2} \mathrm{d}t + + Examples + ======== + + >>> from sympy import I, oo, erfi + >>> from sympy.abc import z + + Several special values are known: + + >>> erfi(0) + 0 + >>> erfi(oo) + oo + >>> erfi(-oo) + -oo + >>> erfi(I*oo) + I + >>> erfi(-I*oo) + -I + + In general one can pull out factors of -1 and $I$ from the argument: + + >>> erfi(-z) + -erfi(z) + + >>> from sympy import conjugate + >>> conjugate(erfi(z)) + erfi(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(erfi(z), z) + 2*exp(z**2)/sqrt(pi) + + We can numerically evaluate the imaginary error function to arbitrary + precision on the whole complex plane: + + >>> erfi(2).evalf(30) + 18.5648024145755525987042919132 + + >>> erfi(-2*I).evalf(30) + -0.995322265018952734162069256367*I + + See Also + ======== + + erf: Gaussian error function. + erfc: Complementary error function. + erf2: Two-argument error function. + erfinv: Inverse error function. + erfcinv: Inverse Complementary error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Error_function + .. [2] https://mathworld.wolfram.com/Erfi.html + .. [3] https://functions.wolfram.com/GammaBetaErf/Erfi + + """ + + unbranched = True + + def fdiff(self, argindex=1): + if argindex == 1: + return 2*exp(self.args[0]**2)/sqrt(pi) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, z): + if z.is_Number: + if z is S.NaN: + return S.NaN + elif z.is_zero: + return S.Zero + elif z is S.Infinity: + return S.Infinity + + if z.is_zero: + return S.Zero + + # Try to pull out factors of -1 + if z.could_extract_minus_sign(): + return -cls(-z) + + # Try to pull out factors of I + nz = z.extract_multiplicatively(I) + if nz is not None: + if nz is S.Infinity: + return I + if isinstance(nz, erfinv): + return I*nz.args[0] + if isinstance(nz, erfcinv): + return I*(S.One - nz.args[0]) + # Only happens with unevaluated erf2inv + if isinstance(nz, erf2inv) and nz.args[0].is_zero: + return I*nz.args[1] + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0 or n % 2 == 0: + return S.Zero + else: + x = sympify(x) + k = floor((n - 1)/S(2)) + if len(previous_terms) > 2: + return previous_terms[-2] * x**2 * (n - 2)/(n*k) + else: + return 2 * x**n/(n*factorial(k)*sqrt(pi)) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + return self.rewrite(erf).rewrite("tractable", deep=True, limitvar=limitvar) + + def _eval_rewrite_as_erf(self, z, **kwargs): + return -I*erf(I*z) + + def _eval_rewrite_as_erfc(self, z, **kwargs): + return I*erfc(I*z) - I + + def _eval_rewrite_as_fresnels(self, z, **kwargs): + arg = (S.One + I)*z/sqrt(pi) + return (S.One - I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_fresnelc(self, z, **kwargs): + arg = (S.One + I)*z/sqrt(pi) + return (S.One - I)*(fresnelc(arg) - I*fresnels(arg)) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], -z**2) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], z**2) + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return sqrt(-z**2)/z*(uppergamma(S.Half, -z**2)/sqrt(pi) - S.One) + + def _eval_rewrite_as_expint(self, z, **kwargs): + return sqrt(-z**2)/z - z*expint(S.Half, -z**2)/sqrt(pi) + + def _eval_expand_func(self, **hints): + return self.rewrite(erf) + + as_real_imag = real_to_real_as_real_imag + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if x in arg.free_symbols and arg0.is_zero: + return 2*arg/sqrt(pi) + elif arg0.is_finite: + return self.func(arg0) + return self.func(arg) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + if point is S.Infinity: + z = self.args[0] + s = [factorial2(2*k - 1) / (2**k * z**(2*k + 1)) + for k in range(n)] + [Order(1/z**n, x)] + return -I + (exp(z**2)/sqrt(pi)) * Add(*s) + + return super(erfi, self)._eval_aseries(n, args0, x, logx) + + +class erf2(DefinedFunction): + r""" + Two-argument error function. + + Explanation + =========== + + This function is defined as: + + .. math :: + \mathrm{erf2}(x, y) = \frac{2}{\sqrt{\pi}} \int_x^y e^{-t^2} \mathrm{d}t + + Examples + ======== + + >>> from sympy import oo, erf2 + >>> from sympy.abc import x, y + + Several special values are known: + + >>> erf2(0, 0) + 0 + >>> erf2(x, x) + 0 + >>> erf2(x, oo) + 1 - erf(x) + >>> erf2(x, -oo) + -erf(x) - 1 + >>> erf2(oo, y) + erf(y) - 1 + >>> erf2(-oo, y) + erf(y) + 1 + + In general one can pull out factors of -1: + + >>> erf2(-x, -y) + -erf2(x, y) + + The error function obeys the mirror symmetry: + + >>> from sympy import conjugate + >>> conjugate(erf2(x, y)) + erf2(conjugate(x), conjugate(y)) + + Differentiation with respect to $x$, $y$ is supported: + + >>> from sympy import diff + >>> diff(erf2(x, y), x) + -2*exp(-x**2)/sqrt(pi) + >>> diff(erf2(x, y), y) + 2*exp(-y**2)/sqrt(pi) + + See Also + ======== + + erf: Gaussian error function. + erfc: Complementary error function. + erfi: Imaginary error function. + erfinv: Inverse error function. + erfcinv: Inverse Complementary error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://functions.wolfram.com/GammaBetaErf/Erf2/ + + """ + + + def fdiff(self, argindex): + x, y = self.args + if argindex == 1: + return -2*exp(-x**2)/sqrt(pi) + elif argindex == 2: + return 2*exp(-y**2)/sqrt(pi) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, x, y): + chk = (S.Infinity, S.NegativeInfinity, S.Zero) + if x is S.NaN or y is S.NaN: + return S.NaN + elif x == y: + return S.Zero + elif x in chk or y in chk: + return erf(y) - erf(x) + + if isinstance(y, erf2inv) and y.args[0] == x: + return y.args[1] + + if x.is_zero or y.is_zero or x.is_extended_real and x.is_infinite or \ + y.is_extended_real and y.is_infinite: + return erf(y) - erf(x) + + #Try to pull out -1 factor + sign_x = x.could_extract_minus_sign() + sign_y = y.could_extract_minus_sign() + if (sign_x and sign_y): + return -cls(-x, -y) + elif (sign_x or sign_y): + return erf(y)-erf(x) + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate(), self.args[1].conjugate()) + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real and self.args[1].is_extended_real + + def _eval_rewrite_as_erf(self, x, y, **kwargs): + return erf(y) - erf(x) + + def _eval_rewrite_as_erfc(self, x, y, **kwargs): + return erfc(x) - erfc(y) + + def _eval_rewrite_as_erfi(self, x, y, **kwargs): + return I*(erfi(I*x)-erfi(I*y)) + + def _eval_rewrite_as_fresnels(self, x, y, **kwargs): + return erf(y).rewrite(fresnels) - erf(x).rewrite(fresnels) + + def _eval_rewrite_as_fresnelc(self, x, y, **kwargs): + return erf(y).rewrite(fresnelc) - erf(x).rewrite(fresnelc) + + def _eval_rewrite_as_meijerg(self, x, y, **kwargs): + return erf(y).rewrite(meijerg) - erf(x).rewrite(meijerg) + + def _eval_rewrite_as_hyper(self, x, y, **kwargs): + return erf(y).rewrite(hyper) - erf(x).rewrite(hyper) + + def _eval_rewrite_as_uppergamma(self, x, y, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return (sqrt(y**2)/y*(S.One - uppergamma(S.Half, y**2)/sqrt(pi)) - + sqrt(x**2)/x*(S.One - uppergamma(S.Half, x**2)/sqrt(pi))) + + def _eval_rewrite_as_expint(self, x, y, **kwargs): + return erf(y).rewrite(expint) - erf(x).rewrite(expint) + + def _eval_expand_func(self, **hints): + return self.rewrite(erf) + + def _eval_is_zero(self): + return is_eq(*self.args) + +class erfinv(DefinedFunction): + r""" + Inverse Error Function. The erfinv function is defined as: + + .. math :: + \mathrm{erf}(x) = y \quad \Rightarrow \quad \mathrm{erfinv}(y) = x + + Examples + ======== + + >>> from sympy import erfinv + >>> from sympy.abc import x + + Several special values are known: + + >>> erfinv(0) + 0 + >>> erfinv(1) + oo + + Differentiation with respect to $x$ is supported: + + >>> from sympy import diff + >>> diff(erfinv(x), x) + sqrt(pi)*exp(erfinv(x)**2)/2 + + We can numerically evaluate the inverse error function to arbitrary + precision on [-1, 1]: + + >>> erfinv(0.2).evalf(30) + 0.179143454621291692285822705344 + + See Also + ======== + + erf: Gaussian error function. + erfc: Complementary error function. + erfi: Imaginary error function. + erf2: Two-argument error function. + erfcinv: Inverse Complementary error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Error_function#Inverse_functions + .. [2] https://functions.wolfram.com/GammaBetaErf/InverseErf/ + + """ + + + def fdiff(self, argindex =1): + if argindex == 1: + return sqrt(pi)*exp(self.func(self.args[0])**2)*S.Half + else : + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + + """ + return erf + + @classmethod + def eval(cls, z): + if z is S.NaN: + return S.NaN + elif z is S.NegativeOne: + return S.NegativeInfinity + elif z.is_zero: + return S.Zero + elif z is S.One: + return S.Infinity + + if isinstance(z, erf) and z.args[0].is_extended_real: + return z.args[0] + + if z.is_zero: + return S.Zero + + # Try to pull out factors of -1 + nz = z.extract_multiplicatively(-1) + if nz is not None and (isinstance(nz, erf) and (nz.args[0]).is_extended_real): + return -nz.args[0] + + def _eval_rewrite_as_erfcinv(self, z, **kwargs): + return erfcinv(1-z) + + def _eval_is_zero(self): + return self.args[0].is_zero + + +class erfcinv (DefinedFunction): + r""" + Inverse Complementary Error Function. The erfcinv function is defined as: + + .. math :: + \mathrm{erfc}(x) = y \quad \Rightarrow \quad \mathrm{erfcinv}(y) = x + + Examples + ======== + + >>> from sympy import erfcinv + >>> from sympy.abc import x + + Several special values are known: + + >>> erfcinv(1) + 0 + >>> erfcinv(0) + oo + + Differentiation with respect to $x$ is supported: + + >>> from sympy import diff + >>> diff(erfcinv(x), x) + -sqrt(pi)*exp(erfcinv(x)**2)/2 + + See Also + ======== + + erf: Gaussian error function. + erfc: Complementary error function. + erfi: Imaginary error function. + erf2: Two-argument error function. + erfinv: Inverse error function. + erf2inv: Inverse two-argument error function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Error_function#Inverse_functions + .. [2] https://functions.wolfram.com/GammaBetaErf/InverseErfc/ + + """ + + + def fdiff(self, argindex =1): + if argindex == 1: + return -sqrt(pi)*exp(self.func(self.args[0])**2)*S.Half + else: + raise ArgumentIndexError(self, argindex) + + def inverse(self, argindex=1): + """ + Returns the inverse of this function. + + """ + return erfc + + @classmethod + def eval(cls, z): + if z is S.NaN: + return S.NaN + elif z.is_zero: + return S.Infinity + elif z is S.One: + return S.Zero + elif z == 2: + return S.NegativeInfinity + + if z.is_zero: + return S.Infinity + + def _eval_rewrite_as_erfinv(self, z, **kwargs): + return erfinv(1-z) + + def _eval_is_zero(self): + return (self.args[0] - 1).is_zero + + def _eval_is_infinite(self): + z = self.args[0] + return fuzzy_or([z.is_zero, is_eq(z, Integer(2))]) + + +class erf2inv(DefinedFunction): + r""" + Two-argument Inverse error function. The erf2inv function is defined as: + + .. math :: + \mathrm{erf2}(x, w) = y \quad \Rightarrow \quad \mathrm{erf2inv}(x, y) = w + + Examples + ======== + + >>> from sympy import erf2inv, oo + >>> from sympy.abc import x, y + + Several special values are known: + + >>> erf2inv(0, 0) + 0 + >>> erf2inv(1, 0) + 1 + >>> erf2inv(0, 1) + oo + >>> erf2inv(0, y) + erfinv(y) + >>> erf2inv(oo, y) + erfcinv(-y) + + Differentiation with respect to $x$ and $y$ is supported: + + >>> from sympy import diff + >>> diff(erf2inv(x, y), x) + exp(-x**2 + erf2inv(x, y)**2) + >>> diff(erf2inv(x, y), y) + sqrt(pi)*exp(erf2inv(x, y)**2)/2 + + See Also + ======== + + erf: Gaussian error function. + erfc: Complementary error function. + erfi: Imaginary error function. + erf2: Two-argument error function. + erfinv: Inverse error function. + erfcinv: Inverse complementary error function. + + References + ========== + + .. [1] https://functions.wolfram.com/GammaBetaErf/InverseErf2/ + + """ + + + def fdiff(self, argindex): + x, y = self.args + if argindex == 1: + return exp(self.func(x,y)**2-x**2) + elif argindex == 2: + return sqrt(pi)*S.Half*exp(self.func(x,y)**2) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, x, y): + if x is S.NaN or y is S.NaN: + return S.NaN + elif x.is_zero and y.is_zero: + return S.Zero + elif x.is_zero and y is S.One: + return S.Infinity + elif x is S.One and y.is_zero: + return S.One + elif x.is_zero: + return erfinv(y) + elif x is S.Infinity: + return erfcinv(-y) + elif y.is_zero: + return x + elif y is S.Infinity: + return erfinv(x) + + if x.is_zero: + if y.is_zero: + return S.Zero + else: + return erfinv(y) + if y.is_zero: + return x + + def _eval_is_zero(self): + x, y = self.args + if x.is_zero and y.is_zero: + return True + +############################################################################### +#################### EXPONENTIAL INTEGRALS #################################### +############################################################################### + +class Ei(DefinedFunction): + r""" + The classical exponential integral. + + Explanation + =========== + + For use in SymPy, this function is defined as + + .. math:: \operatorname{Ei}(x) = \sum_{n=1}^\infty \frac{x^n}{n\, n!} + + \log(x) + \gamma, + + where $\gamma$ is the Euler-Mascheroni constant. + + If $x$ is a polar number, this defines an analytic function on the + Riemann surface of the logarithm. Otherwise this defines an analytic + function in the cut plane $\mathbb{C} \setminus (-\infty, 0]$. + + **Background** + + The name exponential integral comes from the following statement: + + .. math:: \operatorname{Ei}(x) = \int_{-\infty}^x \frac{e^t}{t} \mathrm{d}t + + If the integral is interpreted as a Cauchy principal value, this statement + holds for $x > 0$ and $\operatorname{Ei}(x)$ as defined above. + + Examples + ======== + + >>> from sympy import Ei, polar_lift, exp_polar, I, pi + >>> from sympy.abc import x + + >>> Ei(-1) + Ei(-1) + + This yields a real value: + + >>> Ei(-1).n(chop=True) + -0.219383934395520 + + On the other hand the analytic continuation is not real: + + >>> Ei(polar_lift(-1)).n(chop=True) + -0.21938393439552 + 3.14159265358979*I + + The exponential integral has a logarithmic branch point at the origin: + + >>> Ei(x*exp_polar(2*I*pi)) + Ei(x) + 2*I*pi + + Differentiation is supported: + + >>> Ei(x).diff(x) + exp(x)/x + + The exponential integral is related to many other special functions. + For example: + + >>> from sympy import expint, Shi + >>> Ei(x).rewrite(expint) + -expint(1, x*exp_polar(I*pi)) - I*pi + >>> Ei(x).rewrite(Shi) + Chi(x) + Shi(x) + + See Also + ======== + + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + uppergamma: Upper incomplete gamma function. + + References + ========== + + .. [1] https://dlmf.nist.gov/6.6 + .. [2] https://en.wikipedia.org/wiki/Exponential_integral + .. [3] Abramowitz & Stegun, section 5: https://web.archive.org/web/20201128173312/http://people.math.sfu.ca/~cbm/aands/page_228.htm + + """ + + + @classmethod + def eval(cls, z): + if z.is_zero: + return S.NegativeInfinity + elif z is S.Infinity: + return S.Infinity + elif z is S.NegativeInfinity: + return S.Zero + + if z.is_zero: + return S.NegativeInfinity + + nz, n = z.extract_branch_factor() + if n: + return Ei(nz) + 2*I*pi*n + + def fdiff(self, argindex=1): + arg = unpolarify(self.args[0]) + if argindex == 1: + return exp(arg)/arg + else: + raise ArgumentIndexError(self, argindex) + + def _eval_evalf(self, prec): + if (self.args[0]/polar_lift(-1)).is_positive: + return super()._eval_evalf(prec) + (I*pi)._eval_evalf(prec) + return super()._eval_evalf(prec) + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + # XXX this does not currently work usefully because uppergamma + # immediately turns into expint + return -uppergamma(0, polar_lift(-1)*z) - I*pi + + def _eval_rewrite_as_expint(self, z, **kwargs): + return -expint(1, polar_lift(-1)*z) - I*pi + + def _eval_rewrite_as_li(self, z, **kwargs): + if isinstance(z, log): + return li(z.args[0]) + # TODO: + # Actually it only holds that: + # Ei(z) = li(exp(z)) + # for -pi < imag(z) <= pi + return li(exp(z)) + + def _eval_rewrite_as_Si(self, z, **kwargs): + if z.is_negative: + return Shi(z) + Chi(z) - I*pi + else: + return Shi(z) + Chi(z) + _eval_rewrite_as_Ci = _eval_rewrite_as_Si + _eval_rewrite_as_Chi = _eval_rewrite_as_Si + _eval_rewrite_as_Shi = _eval_rewrite_as_Si + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + return exp(z) * _eis(z) + + def _eval_rewrite_as_Integral(self, z, **kwargs): + from sympy.integrals.integrals import Integral + t = Dummy(uniquely_named_symbol('t', [z]).name) + return Integral(S.Exp1**t/t, (t, S.NegativeInfinity, z)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy import re + x0 = self.args[0].limit(x, 0) + arg = self.args[0].as_leading_term(x, cdir=cdir) + cdir = arg.dir(x, cdir) + if x0.is_zero: + c, e = arg.as_coeff_exponent(x) + logx = log(x) if logx is None else logx + return log(c) + e*logx + EulerGamma - ( + I*pi if re(cdir).is_negative else S.Zero) + return super()._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + x0 = self.args[0].limit(x, 0) + if x0.is_zero: + f = self._eval_rewrite_as_Si(*self.args) + return f._eval_nseries(x, n, logx) + return super()._eval_nseries(x, n, logx) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + if point in (S.Infinity, S.NegativeInfinity): + z = self.args[0] + s = [factorial(k) / (z)**k for k in range(n)] + \ + [Order(1/z**n, x)] + return (exp(z)/z) * Add(*s) + + return super(Ei, self)._eval_aseries(n, args0, x, logx) + + +class expint(DefinedFunction): + r""" + Generalized exponential integral. + + Explanation + =========== + + This function is defined as + + .. math:: \operatorname{E}_\nu(z) = z^{\nu - 1} \Gamma(1 - \nu, z), + + where $\Gamma(1 - \nu, z)$ is the upper incomplete gamma function + (``uppergamma``). + + Hence for $z$ with positive real part we have + + .. math:: \operatorname{E}_\nu(z) + = \int_1^\infty \frac{e^{-zt}}{t^\nu} \mathrm{d}t, + + which explains the name. + + The representation as an incomplete gamma function provides an analytic + continuation for $\operatorname{E}_\nu(z)$. If $\nu$ is a + non-positive integer, the exponential integral is thus an unbranched + function of $z$, otherwise there is a branch point at the origin. + Refer to the incomplete gamma function documentation for details of the + branching behavior. + + Examples + ======== + + >>> from sympy import expint, S + >>> from sympy.abc import nu, z + + Differentiation is supported. Differentiation with respect to $z$ further + explains the name: for integral orders, the exponential integral is an + iterated integral of the exponential function. + + >>> expint(nu, z).diff(z) + -expint(nu - 1, z) + + Differentiation with respect to $\nu$ has no classical expression: + + >>> expint(nu, z).diff(nu) + -z**(nu - 1)*meijerg(((), (1, 1)), ((0, 0, 1 - nu), ()), z) + + At non-postive integer orders, the exponential integral reduces to the + exponential function: + + >>> expint(0, z) + exp(-z)/z + >>> expint(-1, z) + exp(-z)/z + exp(-z)/z**2 + + At half-integers it reduces to error functions: + + >>> expint(S(1)/2, z) + sqrt(pi)*erfc(sqrt(z))/sqrt(z) + + At positive integer orders it can be rewritten in terms of exponentials + and ``expint(1, z)``. Use ``expand_func()`` to do this: + + >>> from sympy import expand_func + >>> expand_func(expint(5, z)) + z**4*expint(1, z)/24 + (-z**3 + z**2 - 2*z + 6)*exp(-z)/24 + + The generalised exponential integral is essentially equivalent to the + incomplete gamma function: + + >>> from sympy import uppergamma + >>> expint(nu, z).rewrite(uppergamma) + z**(nu - 1)*uppergamma(1 - nu, z) + + As such it is branched at the origin: + + >>> from sympy import exp_polar, pi, I + >>> expint(4, z*exp_polar(2*pi*I)) + I*pi*z**3/3 + expint(4, z) + >>> expint(nu, z*exp_polar(2*pi*I)) + z**(nu - 1)*(exp(2*I*pi*nu) - 1)*gamma(1 - nu) + expint(nu, z) + + See Also + ======== + + Ei: Another related function called exponential integral. + E1: The classical case, returns expint(1, z). + li: Logarithmic integral. + Li: Offset logarithmic integral. + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + uppergamma + + References + ========== + + .. [1] https://dlmf.nist.gov/8.19 + .. [2] https://functions.wolfram.com/GammaBetaErf/ExpIntegralE/ + .. [3] https://en.wikipedia.org/wiki/Exponential_integral + + """ + + + @classmethod + def eval(cls, nu, z): + from sympy.functions.special.gamma_functions import (gamma, uppergamma) + nu2 = unpolarify(nu) + if nu != nu2: + return expint(nu2, z) + if nu.is_Integer and nu <= 0 or (not nu.is_Integer and (2*nu).is_Integer): + return unpolarify(expand_mul(z**(nu - 1)*uppergamma(1 - nu, z))) + + # Extract branching information. This can be deduced from what is + # explained in lowergamma.eval(). + z, n = z.extract_branch_factor() + if n is S.Zero: + return + if nu.is_integer: + if not nu > 0: + return + return expint(nu, z) \ + - 2*pi*I*n*S.NegativeOne**(nu - 1)/factorial(nu - 1)*unpolarify(z)**(nu - 1) + else: + return (exp(2*I*pi*nu*n) - 1)*z**(nu - 1)*gamma(1 - nu) + expint(nu, z) + + def fdiff(self, argindex): + nu, z = self.args + if argindex == 1: + return -z**(nu - 1)*meijerg([], [1, 1], [0, 0, 1 - nu], [], z) + elif argindex == 2: + return -expint(nu - 1, z) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_uppergamma(self, nu, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return z**(nu - 1)*uppergamma(1 - nu, z) + + def _eval_rewrite_as_Ei(self, nu, z, **kwargs): + if nu == 1: + return -Ei(z*exp_polar(-I*pi)) - I*pi + elif nu.is_Integer and nu > 1: + # DLMF, 8.19.7 + x = -unpolarify(z) + return x**(nu - 1)/factorial(nu - 1)*E1(z).rewrite(Ei) + \ + exp(x)/factorial(nu - 1) * \ + Add(*[factorial(nu - k - 2)*x**k for k in range(nu - 1)]) + else: + return self + + def _eval_expand_func(self, **hints): + return self.rewrite(Ei).rewrite(expint, **hints) + + def _eval_rewrite_as_Si(self, nu, z, **kwargs): + if nu != 1: + return self + return Shi(z) - Chi(z) + _eval_rewrite_as_Ci = _eval_rewrite_as_Si + _eval_rewrite_as_Chi = _eval_rewrite_as_Si + _eval_rewrite_as_Shi = _eval_rewrite_as_Si + + def _eval_nseries(self, x, n, logx, cdir=0): + if not self.args[0].has(x): + nu = self.args[0] + if nu == 1: + f = self._eval_rewrite_as_Si(*self.args) + return f._eval_nseries(x, n, logx) + elif nu.is_Integer and nu > 1: + f = self._eval_rewrite_as_Ei(*self.args) + return f._eval_nseries(x, n, logx) + return super()._eval_nseries(x, n, logx) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[1] + nu = self.args[0] + + if point is S.Infinity: + z = self.args[1] + s = [S.NegativeOne**k * RisingFactorial(nu, k) / z**k for k in range(n)] + [Order(1/z**n, x)] + return (exp(-z)/z) * Add(*s) + + return super(expint, self)._eval_aseries(n, args0, x, logx) + + def _eval_rewrite_as_Integral(self, *args, **kwargs): + from sympy.integrals.integrals import Integral + n, x = self.args + t = Dummy(uniquely_named_symbol('t', args).name) + return Integral(t**-n * exp(-t*x), (t, 1, S.Infinity)) + + +def E1(z): + """ + Classical case of the generalized exponential integral. + + Explanation + =========== + + This is equivalent to ``expint(1, z)``. + + Examples + ======== + + >>> from sympy import E1 + >>> E1(0) + expint(1, 0) + + >>> E1(5) + expint(1, 5) + + See Also + ======== + + Ei: Exponential integral. + expint: Generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + + """ + return expint(1, z) + + +class li(DefinedFunction): + r""" + The classical logarithmic integral. + + Explanation + =========== + + For use in SymPy, this function is defined as + + .. math:: \operatorname{li}(x) = \int_0^x \frac{1}{\log(t)} \mathrm{d}t \,. + + Examples + ======== + + >>> from sympy import I, oo, li + >>> from sympy.abc import z + + Several special values are known: + + >>> li(0) + 0 + >>> li(1) + -oo + >>> li(oo) + oo + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(li(z), z) + 1/log(z) + + Defining the ``li`` function via an integral: + >>> from sympy import integrate + >>> integrate(li(z)) + z*li(z) - Ei(2*log(z)) + + >>> integrate(li(z),z) + z*li(z) - Ei(2*log(z)) + + + The logarithmic integral can also be defined in terms of ``Ei``: + + >>> from sympy import Ei + >>> li(z).rewrite(Ei) + Ei(log(z)) + >>> diff(li(z).rewrite(Ei), z) + 1/log(z) + + We can numerically evaluate the logarithmic integral to arbitrary precision + on the whole complex plane (except the singular points): + + >>> li(2).evalf(30) + 1.04516378011749278484458888919 + + >>> li(2*I).evalf(30) + 1.0652795784357498247001125598 + 3.08346052231061726610939702133*I + + We can even compute Soldner's constant by the help of mpmath: + + >>> from mpmath import findroot + >>> findroot(li, 2) + 1.45136923488338 + + Further transformations include rewriting ``li`` in terms of + the trigonometric integrals ``Si``, ``Ci``, ``Shi`` and ``Chi``: + + >>> from sympy import Si, Ci, Shi, Chi + >>> li(z).rewrite(Si) + -log(I*log(z)) - log(1/log(z))/2 + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z)) + >>> li(z).rewrite(Ci) + -log(I*log(z)) - log(1/log(z))/2 + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z)) + >>> li(z).rewrite(Shi) + -log(1/log(z))/2 + log(log(z))/2 + Chi(log(z)) - Shi(log(z)) + >>> li(z).rewrite(Chi) + -log(1/log(z))/2 + log(log(z))/2 + Chi(log(z)) - Shi(log(z)) + + See Also + ======== + + Li: Offset logarithmic integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Logarithmic_integral + .. [2] https://mathworld.wolfram.com/LogarithmicIntegral.html + .. [3] https://dlmf.nist.gov/6 + .. [4] https://mathworld.wolfram.com/SoldnersConstant.html + + """ + + + @classmethod + def eval(cls, z): + if z.is_zero: + return S.Zero + elif z is S.One: + return S.NegativeInfinity + elif z is S.Infinity: + return S.Infinity + if z.is_zero: + return S.Zero + + def fdiff(self, argindex=1): + arg = self.args[0] + if argindex == 1: + return S.One / log(arg) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_conjugate(self): + z = self.args[0] + # Exclude values on the branch cut (-oo, 0) + if not z.is_extended_negative: + return self.func(z.conjugate()) + + def _eval_rewrite_as_Li(self, z, **kwargs): + return Li(z) + li(2) + + def _eval_rewrite_as_Ei(self, z, **kwargs): + return Ei(log(z)) + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return (-uppergamma(0, -log(z)) + + S.Half*(log(log(z)) - log(S.One/log(z))) - log(-log(z))) + + def _eval_rewrite_as_Si(self, z, **kwargs): + return (Ci(I*log(z)) - I*Si(I*log(z)) - + S.Half*(log(S.One/log(z)) - log(log(z))) - log(I*log(z))) + + _eval_rewrite_as_Ci = _eval_rewrite_as_Si + + def _eval_rewrite_as_Shi(self, z, **kwargs): + return (Chi(log(z)) - Shi(log(z)) - S.Half*(log(S.One/log(z)) - log(log(z)))) + + _eval_rewrite_as_Chi = _eval_rewrite_as_Shi + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return (log(z)*hyper((1, 1), (2, 2), log(z)) + + S.Half*(log(log(z)) - log(S.One/log(z))) + EulerGamma) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return (-log(-log(z)) - S.Half*(log(S.One/log(z)) - log(log(z))) + - meijerg(((), (1,)), ((0, 0), ()), -log(z))) + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + return z * _eis(log(z)) + + def _eval_nseries(self, x, n, logx, cdir=0): + z = self.args[0] + s = [(log(z))**k / (factorial(k) * k) for k in range(1, n)] + return EulerGamma + log(log(z)) + Add(*s) + + def _eval_is_zero(self): + z = self.args[0] + if z.is_zero: + return True + +class Li(DefinedFunction): + r""" + The offset logarithmic integral. + + Explanation + =========== + + For use in SymPy, this function is defined as + + .. math:: \operatorname{Li}(x) = \operatorname{li}(x) - \operatorname{li}(2) + + Examples + ======== + + >>> from sympy import Li + >>> from sympy.abc import z + + The following special value is known: + + >>> Li(2) + 0 + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(Li(z), z) + 1/log(z) + + The shifted logarithmic integral can be written in terms of $li(z)$: + + >>> from sympy import li + >>> Li(z).rewrite(li) + li(z) - li(2) + + We can numerically evaluate the logarithmic integral to arbitrary precision + on the whole complex plane (except the singular points): + + >>> Li(2).evalf(30) + 0 + + >>> Li(4).evalf(30) + 1.92242131492155809316615998938 + + See Also + ======== + + li: Logarithmic integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Logarithmic_integral + .. [2] https://mathworld.wolfram.com/LogarithmicIntegral.html + .. [3] https://dlmf.nist.gov/6 + + """ + + + @classmethod + def eval(cls, z): + if z is S.Infinity: + return S.Infinity + elif z == S(2): + return S.Zero + + def fdiff(self, argindex=1): + arg = self.args[0] + if argindex == 1: + return S.One / log(arg) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_evalf(self, prec): + return self.rewrite(li).evalf(prec) + + def _eval_rewrite_as_li(self, z, **kwargs): + return li(z) - li(2) + + def _eval_rewrite_as_tractable(self, z, limitvar=None, **kwargs): + return self.rewrite(li).rewrite("tractable", deep=True) + + def _eval_nseries(self, x, n, logx, cdir=0): + f = self._eval_rewrite_as_li(*self.args) + return f._eval_nseries(x, n, logx) + +############################################################################### +#################### TRIGONOMETRIC INTEGRALS ################################## +############################################################################### + +class TrigonometricIntegral(DefinedFunction): + """ Base class for trigonometric integrals. """ + + + @classmethod + def eval(cls, z): + if z is S.Zero: + return cls._atzero + elif z is S.Infinity: + return cls._atinf() + elif z is S.NegativeInfinity: + return cls._atneginf() + + if z.is_zero: + return cls._atzero + + nz = z.extract_multiplicatively(polar_lift(I)) + if nz is None and cls._trigfunc(0) == 0: + nz = z.extract_multiplicatively(I) + if nz is not None: + return cls._Ifactor(nz, 1) + nz = z.extract_multiplicatively(polar_lift(-I)) + if nz is not None: + return cls._Ifactor(nz, -1) + + nz = z.extract_multiplicatively(polar_lift(-1)) + if nz is None and cls._trigfunc(0) == 0: + nz = z.extract_multiplicatively(-1) + if nz is not None: + return cls._minusfactor(nz) + + nz, n = z.extract_branch_factor() + if n == 0 and nz == z: + return + return 2*pi*I*n*cls._trigfunc(0) + cls(nz) + + def fdiff(self, argindex=1): + arg = unpolarify(self.args[0]) + if argindex == 1: + return self._trigfunc(arg)/arg + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Ei(self, z, **kwargs): + return self._eval_rewrite_as_expint(z).rewrite(Ei) + + def _eval_rewrite_as_uppergamma(self, z, **kwargs): + from sympy.functions.special.gamma_functions import uppergamma + return self._eval_rewrite_as_expint(z).rewrite(uppergamma) + + def _eval_nseries(self, x, n, logx, cdir=0): + # NOTE this is fairly inefficient + if self.args[0].subs(x, 0) != 0: + return super()._eval_nseries(x, n, logx) + baseseries = self._trigfunc(x)._eval_nseries(x, n, logx) + if self._trigfunc(0) != 0: + baseseries -= 1 + baseseries = baseseries.replace(Pow, lambda t, n: t**n/n, simultaneous=False) + if self._trigfunc(0) != 0: + baseseries += EulerGamma + log(x) + return baseseries.subs(x, self.args[0])._eval_nseries(x, n, logx) + + +class Si(TrigonometricIntegral): + r""" + Sine integral. + + Explanation + =========== + + This function is defined by + + .. math:: \operatorname{Si}(z) = \int_0^z \frac{\sin{t}}{t} \mathrm{d}t. + + It is an entire function. + + Examples + ======== + + >>> from sympy import Si + >>> from sympy.abc import z + + The sine integral is an antiderivative of $sin(z)/z$: + + >>> Si(z).diff(z) + sin(z)/z + + It is unbranched: + + >>> from sympy import exp_polar, I, pi + >>> Si(z*exp_polar(2*I*pi)) + Si(z) + + Sine integral behaves much like ordinary sine under multiplication by ``I``: + + >>> Si(I*z) + I*Shi(z) + >>> Si(-z) + -Si(z) + + It can also be expressed in terms of exponential integrals, but beware + that the latter is branched: + + >>> from sympy import expint + >>> Si(z).rewrite(expint) + -I*(-expint(1, z*exp_polar(-I*pi/2))/2 + + expint(1, z*exp_polar(I*pi/2))/2) + pi/2 + + It can be rewritten in the form of sinc function (by definition): + + >>> from sympy import sinc + >>> Si(z).rewrite(sinc) + Integral(sinc(_t), (_t, 0, z)) + + See Also + ======== + + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + sinc: unnormalized sinc function + E1: Special case of the generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_integral + + """ + + _trigfunc = sin + _atzero = S.Zero + + @classmethod + def _atinf(cls): + return pi*S.Half + + @classmethod + def _atneginf(cls): + return -pi*S.Half + + @classmethod + def _minusfactor(cls, z): + return -Si(z) + + @classmethod + def _Ifactor(cls, z, sign): + return I*Shi(z)*sign + + def _eval_rewrite_as_expint(self, z, **kwargs): + # XXX should we polarify z? + return pi/2 + (E1(polar_lift(I)*z) - E1(polar_lift(-I)*z))/2/I + + def _eval_rewrite_as_Integral(self, z, **kwargs): + from sympy.integrals.integrals import Integral + t = Dummy(uniquely_named_symbol('t', [z]).name) + return Integral(sinc(t), (t, 0, z)) + + _eval_rewrite_as_sinc = _eval_rewrite_as_Integral + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + return arg + elif not arg0.is_infinite: + return self.func(arg0) + else: + return self + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + # Expansion at oo + if point is S.Infinity: + z = self.args[0] + p = [S.NegativeOne**k * factorial(2*k) / z**(2*k + 1) + for k in range(n//2 + 1)] + [Order(1/z**n, x)] + q = [S.NegativeOne**k * factorial(2*k + 1) / z**(2*(k + 1)) + for k in range(n//2)] + [Order(1/z**n, x)] + return pi/2 - cos(z)*Add(*p) - sin(z)*Add(*q) + + # All other points are not handled + return super(Si, self)._eval_aseries(n, args0, x, logx) + + def _eval_is_zero(self): + z = self.args[0] + if z.is_zero: + return True + + +class Ci(TrigonometricIntegral): + r""" + Cosine integral. + + Explanation + =========== + + This function is defined for positive $x$ by + + .. math:: \operatorname{Ci}(x) = \gamma + \log{x} + + \int_0^x \frac{\cos{t} - 1}{t} \mathrm{d}t + = -\int_x^\infty \frac{\cos{t}}{t} \mathrm{d}t, + + where $\gamma$ is the Euler-Mascheroni constant. + + We have + + .. math:: \operatorname{Ci}(z) = + -\frac{\operatorname{E}_1\left(e^{i\pi/2} z\right) + + \operatorname{E}_1\left(e^{-i \pi/2} z\right)}{2} + + which holds for all polar $z$ and thus provides an analytic + continuation to the Riemann surface of the logarithm. + + The formula also holds as stated + for $z \in \mathbb{C}$ with $\Re(z) > 0$. + By lifting to the principal branch, we obtain an analytic function on the + cut complex plane. + + Examples + ======== + + >>> from sympy import Ci + >>> from sympy.abc import z + + The cosine integral is a primitive of $\cos(z)/z$: + + >>> Ci(z).diff(z) + cos(z)/z + + It has a logarithmic branch point at the origin: + + >>> from sympy import exp_polar, I, pi + >>> Ci(z*exp_polar(2*I*pi)) + Ci(z) + 2*I*pi + + The cosine integral behaves somewhat like ordinary $\cos$ under + multiplication by $i$: + + >>> from sympy import polar_lift + >>> Ci(polar_lift(I)*z) + Chi(z) + I*pi/2 + >>> Ci(polar_lift(-1)*z) + Ci(z) + I*pi + + It can also be expressed in terms of exponential integrals: + + >>> from sympy import expint + >>> Ci(z).rewrite(expint) + -expint(1, z*exp_polar(-I*pi/2))/2 - expint(1, z*exp_polar(I*pi/2))/2 + + See Also + ======== + + Si: Sine integral. + Shi: Hyperbolic sine integral. + Chi: Hyperbolic cosine integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_integral + + """ + + _trigfunc = cos + _atzero = S.ComplexInfinity + + @classmethod + def _atinf(cls): + return S.Zero + + @classmethod + def _atneginf(cls): + return I*pi + + @classmethod + def _minusfactor(cls, z): + return Ci(z) + I*pi + + @classmethod + def _Ifactor(cls, z, sign): + return Chi(z) + I*pi/2*sign + + def _eval_rewrite_as_expint(self, z, **kwargs): + return -(E1(polar_lift(I)*z) + E1(polar_lift(-I)*z))/2 + + def _eval_rewrite_as_Integral(self, z, **kwargs): + from sympy.integrals.integrals import Integral + t = Dummy(uniquely_named_symbol('t', [z]).name) + return S.EulerGamma + log(z) - Integral((1-cos(t))/t, (t, 0, z)) + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + c, e = arg.as_coeff_exponent(x) + logx = log(x) if logx is None else logx + return log(c) + e*logx + EulerGamma + elif arg0.is_finite: + return self.func(arg0) + else: + return self + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + if point in (S.Infinity, S.NegativeInfinity): + z = self.args[0] + p = [S.NegativeOne**k * factorial(2*k) / z**(2*k + 1) + for k in range(n//2 + 1)] + [Order(1/z**n, x)] + q = [S.NegativeOne**k * factorial(2*k + 1) / z**(2*(k + 1)) + for k in range(n//2)] + [Order(1/z**n, x)] + result = sin(z)*(Add(*p)) - cos(z)*(Add(*q)) + + if point is S.NegativeInfinity: + result += I*pi + return result + + return super(Ci, self)._eval_aseries(n, args0, x, logx) + +class Shi(TrigonometricIntegral): + r""" + Sinh integral. + + Explanation + =========== + + This function is defined by + + .. math:: \operatorname{Shi}(z) = \int_0^z \frac{\sinh{t}}{t} \mathrm{d}t. + + It is an entire function. + + Examples + ======== + + >>> from sympy import Shi + >>> from sympy.abc import z + + The Sinh integral is a primitive of $\sinh(z)/z$: + + >>> Shi(z).diff(z) + sinh(z)/z + + It is unbranched: + + >>> from sympy import exp_polar, I, pi + >>> Shi(z*exp_polar(2*I*pi)) + Shi(z) + + The $\sinh$ integral behaves much like ordinary $\sinh$ under + multiplication by $i$: + + >>> Shi(I*z) + I*Si(z) + >>> Shi(-z) + -Shi(z) + + It can also be expressed in terms of exponential integrals, but beware + that the latter is branched: + + >>> from sympy import expint + >>> Shi(z).rewrite(expint) + expint(1, z)/2 - expint(1, z*exp_polar(I*pi))/2 - I*pi/2 + + See Also + ======== + + Si: Sine integral. + Ci: Cosine integral. + Chi: Hyperbolic cosine integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_integral + + """ + + _trigfunc = sinh + _atzero = S.Zero + + @classmethod + def _atinf(cls): + return S.Infinity + + @classmethod + def _atneginf(cls): + return S.NegativeInfinity + + @classmethod + def _minusfactor(cls, z): + return -Shi(z) + + @classmethod + def _Ifactor(cls, z, sign): + return I*Si(z)*sign + + def _eval_rewrite_as_expint(self, z, **kwargs): + # XXX should we polarify z? + return (E1(z) - E1(exp_polar(I*pi)*z))/2 - I*pi/2 + + def _eval_is_zero(self): + z = self.args[0] + if z.is_zero: + return True + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + return arg + elif not arg0.is_infinite: + return self.func(arg0) + else: + return self + + +class Chi(TrigonometricIntegral): + r""" + Cosh integral. + + Explanation + =========== + + This function is defined for positive $x$ by + + .. math:: \operatorname{Chi}(x) = \gamma + \log{x} + + \int_0^x \frac{\cosh{t} - 1}{t} \mathrm{d}t, + + where $\gamma$ is the Euler-Mascheroni constant. + + We have + + .. math:: \operatorname{Chi}(z) = \operatorname{Ci}\left(e^{i \pi/2}z\right) + - i\frac{\pi}{2}, + + which holds for all polar $z$ and thus provides an analytic + continuation to the Riemann surface of the logarithm. + By lifting to the principal branch we obtain an analytic function on the + cut complex plane. + + Examples + ======== + + >>> from sympy import Chi + >>> from sympy.abc import z + + The $\cosh$ integral is a primitive of $\cosh(z)/z$: + + >>> Chi(z).diff(z) + cosh(z)/z + + It has a logarithmic branch point at the origin: + + >>> from sympy import exp_polar, I, pi + >>> Chi(z*exp_polar(2*I*pi)) + Chi(z) + 2*I*pi + + The $\cosh$ integral behaves somewhat like ordinary $\cosh$ under + multiplication by $i$: + + >>> from sympy import polar_lift + >>> Chi(polar_lift(I)*z) + Ci(z) + I*pi/2 + >>> Chi(polar_lift(-1)*z) + Chi(z) + I*pi + + It can also be expressed in terms of exponential integrals: + + >>> from sympy import expint + >>> Chi(z).rewrite(expint) + -expint(1, z)/2 - expint(1, z*exp_polar(I*pi))/2 - I*pi/2 + + See Also + ======== + + Si: Sine integral. + Ci: Cosine integral. + Shi: Hyperbolic sine integral. + Ei: Exponential integral. + expint: Generalised exponential integral. + E1: Special case of the generalised exponential integral. + li: Logarithmic integral. + Li: Offset logarithmic integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Trigonometric_integral + + """ + + _trigfunc = cosh + _atzero = S.ComplexInfinity + + @classmethod + def _atinf(cls): + return S.Infinity + + @classmethod + def _atneginf(cls): + return S.Infinity + + @classmethod + def _minusfactor(cls, z): + return Chi(z) + I*pi + + @classmethod + def _Ifactor(cls, z, sign): + return Ci(z) + I*pi/2*sign + + def _eval_rewrite_as_expint(self, z, **kwargs): + return -I*pi/2 - (E1(z) + E1(exp_polar(I*pi)*z))/2 + + def _eval_as_leading_term(self, x, logx, cdir): + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.NaN: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + c, e = arg.as_coeff_exponent(x) + logx = log(x) if logx is None else logx + return log(c) + e*logx + EulerGamma + elif arg0.is_finite: + return self.func(arg0) + else: + return self + + +############################################################################### +#################### FRESNEL INTEGRALS ######################################## +############################################################################### + +class FresnelIntegral(DefinedFunction): + """ Base class for the Fresnel integrals.""" + + unbranched = True + + @classmethod + def eval(cls, z): + # Values at positive infinities signs + # if any were extracted automatically + if z is S.Infinity: + return S.Half + + # Value at zero + if z.is_zero: + return S.Zero + + # Try to pull out factors of -1 and I + prefact = S.One + newarg = z + changed = False + + nz = newarg.extract_multiplicatively(-1) + if nz is not None: + prefact = -prefact + newarg = nz + changed = True + + nz = newarg.extract_multiplicatively(I) + if nz is not None: + prefact = cls._sign*I*prefact + newarg = nz + changed = True + + if changed: + return prefact*cls(newarg) + + def fdiff(self, argindex=1): + if argindex == 1: + return self._trigfunc(S.Half*pi*self.args[0]**2) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_is_extended_real(self): + return self.args[0].is_extended_real + + _eval_is_finite = _eval_is_extended_real + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_conjugate(self): + return self.func(self.args[0].conjugate()) + + as_real_imag = real_to_real_as_real_imag + + +class fresnels(FresnelIntegral): + r""" + Fresnel integral S. + + Explanation + =========== + + This function is defined by + + .. math:: \operatorname{S}(z) = \int_0^z \sin{\frac{\pi}{2} t^2} \mathrm{d}t. + + It is an entire function. + + Examples + ======== + + >>> from sympy import I, oo, fresnels + >>> from sympy.abc import z + + Several special values are known: + + >>> fresnels(0) + 0 + >>> fresnels(oo) + 1/2 + >>> fresnels(-oo) + -1/2 + >>> fresnels(I*oo) + -I/2 + >>> fresnels(-I*oo) + I/2 + + In general one can pull out factors of -1 and $i$ from the argument: + + >>> fresnels(-z) + -fresnels(z) + >>> fresnels(I*z) + -I*fresnels(z) + + The Fresnel S integral obeys the mirror symmetry + $\overline{S(z)} = S(\bar{z})$: + + >>> from sympy import conjugate + >>> conjugate(fresnels(z)) + fresnels(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(fresnels(z), z) + sin(pi*z**2/2) + + Defining the Fresnel functions via an integral: + + >>> from sympy import integrate, pi, sin, expand_func + >>> integrate(sin(pi*z**2/2), z) + 3*fresnels(z)*gamma(3/4)/(4*gamma(7/4)) + >>> expand_func(integrate(sin(pi*z**2/2), z)) + fresnels(z) + + We can numerically evaluate the Fresnel integral to arbitrary precision + on the whole complex plane: + + >>> fresnels(2).evalf(30) + 0.343415678363698242195300815958 + + >>> fresnels(-2*I).evalf(30) + 0.343415678363698242195300815958*I + + See Also + ======== + + fresnelc: Fresnel cosine integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Fresnel_integral + .. [2] https://dlmf.nist.gov/7 + .. [3] https://mathworld.wolfram.com/FresnelIntegrals.html + .. [4] https://functions.wolfram.com/GammaBetaErf/FresnelS + .. [5] The converging factors for the fresnel integrals + by John W. Wrench Jr. and Vicki Alley + + """ + _trigfunc = sin + _sign = -S.One + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 1: + p = previous_terms[-1] + return (-pi**2*x**4*(4*n - 1)/(8*n*(2*n + 1)*(4*n + 3))) * p + else: + return x**3 * (-x**4)**n * (S(2)**(-2*n - 1)*pi**(2*n + 1)) / ((4*n + 3)*factorial(2*n + 1)) + + def _eval_rewrite_as_erf(self, z, **kwargs): + return (S.One + I)/4 * (erf((S.One + I)/2*sqrt(pi)*z) - I*erf((S.One - I)/2*sqrt(pi)*z)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return pi*z**3/6 * hyper([Rational(3, 4)], [Rational(3, 2), Rational(7, 4)], -pi**2*z**4/16) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return (pi*z**Rational(9, 4) / (sqrt(2)*(z**2)**Rational(3, 4)*(-z)**Rational(3, 4)) + * meijerg([], [1], [Rational(3, 4)], [Rational(1, 4), 0], -pi**2*z**4/16)) + + def _eval_rewrite_as_Integral(self, z, **kwargs): + from sympy.integrals.integrals import Integral + t = Dummy(uniquely_named_symbol('t', [z]).name) + return Integral(sin(pi*t**2/2), (t, 0, z)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.series.order import Order + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.ComplexInfinity: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + return pi*arg**3/6 + elif arg0 in [S.Infinity, S.NegativeInfinity]: + s = 1 if arg0 is S.Infinity else -1 + return s*S.Half + Order(x, x) + else: + return self.func(arg0) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + # Expansion at oo and -oo + if point in [S.Infinity, -S.Infinity]: + z = self.args[0] + + # expansion of S(x) = S1(x*sqrt(pi/2)), see reference[5] page 1-8 + # as only real infinities are dealt with, sin and cos are O(1) + p = [S.NegativeOne**k * factorial(4*k + 1) / + (2**(2*k + 2) * z**(4*k + 3) * 2**(2*k)*factorial(2*k)) + for k in range(0, n) if 4*k + 3 < n] + q = [1/(2*z)] + [S.NegativeOne**k * factorial(4*k - 1) / + (2**(2*k + 1) * z**(4*k + 1) * 2**(2*k - 1)*factorial(2*k - 1)) + for k in range(1, n) if 4*k + 1 < n] + + p = [-sqrt(2/pi)*t for t in p] + q = [-sqrt(2/pi)*t for t in q] + s = 1 if point is S.Infinity else -1 + # The expansion at oo is 1/2 + some odd powers of z + # To get the expansion at -oo, replace z by -z and flip the sign + # The result -1/2 + the same odd powers of z as before. + return s*S.Half + (sin(z**2)*Add(*p) + cos(z**2)*Add(*q) + ).subs(x, sqrt(2/pi)*x) + Order(1/z**n, x) + + # All other points are not handled + return super()._eval_aseries(n, args0, x, logx) + + +class fresnelc(FresnelIntegral): + r""" + Fresnel integral C. + + Explanation + =========== + + This function is defined by + + .. math:: \operatorname{C}(z) = \int_0^z \cos{\frac{\pi}{2} t^2} \mathrm{d}t. + + It is an entire function. + + Examples + ======== + + >>> from sympy import I, oo, fresnelc + >>> from sympy.abc import z + + Several special values are known: + + >>> fresnelc(0) + 0 + >>> fresnelc(oo) + 1/2 + >>> fresnelc(-oo) + -1/2 + >>> fresnelc(I*oo) + I/2 + >>> fresnelc(-I*oo) + -I/2 + + In general one can pull out factors of -1 and $i$ from the argument: + + >>> fresnelc(-z) + -fresnelc(z) + >>> fresnelc(I*z) + I*fresnelc(z) + + The Fresnel C integral obeys the mirror symmetry + $\overline{C(z)} = C(\bar{z})$: + + >>> from sympy import conjugate + >>> conjugate(fresnelc(z)) + fresnelc(conjugate(z)) + + Differentiation with respect to $z$ is supported: + + >>> from sympy import diff + >>> diff(fresnelc(z), z) + cos(pi*z**2/2) + + Defining the Fresnel functions via an integral: + + >>> from sympy import integrate, pi, cos, expand_func + >>> integrate(cos(pi*z**2/2), z) + fresnelc(z)*gamma(1/4)/(4*gamma(5/4)) + >>> expand_func(integrate(cos(pi*z**2/2), z)) + fresnelc(z) + + We can numerically evaluate the Fresnel integral to arbitrary precision + on the whole complex plane: + + >>> fresnelc(2).evalf(30) + 0.488253406075340754500223503357 + + >>> fresnelc(-2*I).evalf(30) + -0.488253406075340754500223503357*I + + See Also + ======== + + fresnels: Fresnel sine integral. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Fresnel_integral + .. [2] https://dlmf.nist.gov/7 + .. [3] https://mathworld.wolfram.com/FresnelIntegrals.html + .. [4] https://functions.wolfram.com/GammaBetaErf/FresnelC + .. [5] The converging factors for the fresnel integrals + by John W. Wrench Jr. and Vicki Alley + + """ + _trigfunc = cos + _sign = S.One + + @staticmethod + @cacheit + def taylor_term(n, x, *previous_terms): + if n < 0: + return S.Zero + else: + x = sympify(x) + if len(previous_terms) > 1: + p = previous_terms[-1] + return (-pi**2*x**4*(4*n - 3)/(8*n*(2*n - 1)*(4*n + 1))) * p + else: + return x * (-x**4)**n * (S(2)**(-2*n)*pi**(2*n)) / ((4*n + 1)*factorial(2*n)) + + def _eval_rewrite_as_erf(self, z, **kwargs): + return (S.One - I)/4 * (erf((S.One + I)/2*sqrt(pi)*z) + I*erf((S.One - I)/2*sqrt(pi)*z)) + + def _eval_rewrite_as_hyper(self, z, **kwargs): + return z * hyper([Rational(1, 4)], [S.Half, Rational(5, 4)], -pi**2*z**4/16) + + def _eval_rewrite_as_meijerg(self, z, **kwargs): + return (pi*z**Rational(3, 4) / (sqrt(2)*root(z**2, 4)*root(-z, 4)) + * meijerg([], [1], [Rational(1, 4)], [Rational(3, 4), 0], -pi**2*z**4/16)) + + def _eval_rewrite_as_Integral(self, z, **kwargs): + from sympy.integrals.integrals import Integral + t = Dummy(uniquely_named_symbol('t', [z]).name) + return Integral(cos(pi*t**2/2), (t, 0, z)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.series.order import Order + arg = self.args[0].as_leading_term(x, logx=logx, cdir=cdir) + arg0 = arg.subs(x, 0) + + if arg0 is S.ComplexInfinity: + arg0 = arg.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + if arg0.is_zero: + return arg + elif arg0 in [S.Infinity, S.NegativeInfinity]: + s = 1 if arg0 is S.Infinity else -1 + return s*S.Half + Order(x, x) + else: + return self.func(arg0) + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + # Expansion at oo + if point in [S.Infinity, -S.Infinity]: + z = self.args[0] + + # expansion of C(x) = C1(x*sqrt(pi/2)), see reference[5] page 1-8 + # as only real infinities are dealt with, sin and cos are O(1) + p = [S.NegativeOne**k * factorial(4*k + 1) / + (2**(2*k + 2) * z**(4*k + 3) * 2**(2*k)*factorial(2*k)) + for k in range(n) if 4*k + 3 < n] + q = [1/(2*z)] + [S.NegativeOne**k * factorial(4*k - 1) / + (2**(2*k + 1) * z**(4*k + 1) * 2**(2*k - 1)*factorial(2*k - 1)) + for k in range(1, n) if 4*k + 1 < n] + + p = [-sqrt(2/pi)*t for t in p] + q = [ sqrt(2/pi)*t for t in q] + s = 1 if point is S.Infinity else -1 + # The expansion at oo is 1/2 + some odd powers of z + # To get the expansion at -oo, replace z by -z and flip the sign + # The result -1/2 + the same odd powers of z as before. + return s*S.Half + (cos(z**2)*Add(*p) + sin(z**2)*Add(*q) + ).subs(x, sqrt(2/pi)*x) + Order(1/z**n, x) + + # All other points are not handled + return super()._eval_aseries(n, args0, x, logx) + + +############################################################################### +#################### HELPER FUNCTIONS ######################################### +############################################################################### + + +class _erfs(DefinedFunction): + """ + Helper function to make the $\\mathrm{erf}(z)$ function + tractable for the Gruntz algorithm. + + """ + @classmethod + def eval(cls, arg): + if arg.is_zero: + return S.One + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + point = args0[0] + + # Expansion at oo + if point is S.Infinity: + z = self.args[0] + l = [1/sqrt(pi) * factorial(2*k)*(-S( + 4))**(-k)/factorial(k) * (1/z)**(2*k + 1) for k in range(n)] + o = Order(1/z**(2*n + 1), x) + # It is very inefficient to first add the order and then do the nseries + return (Add(*l))._eval_nseries(x, n, logx) + o + + # Expansion at I*oo + t = point.extract_multiplicatively(I) + if t is S.Infinity: + z = self.args[0] + # TODO: is the series really correct? + l = [1/sqrt(pi) * factorial(2*k)*(-S( + 4))**(-k)/factorial(k) * (1/z)**(2*k + 1) for k in range(n)] + o = Order(1/z**(2*n + 1), x) + # It is very inefficient to first add the order and then do the nseries + return (Add(*l))._eval_nseries(x, n, logx) + o + + # All other points are not handled + return super()._eval_aseries(n, args0, x, logx) + + def fdiff(self, argindex=1): + if argindex == 1: + z = self.args[0] + return -2/sqrt(pi) + 2*z*_erfs(z) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_intractable(self, z, **kwargs): + return (S.One - erf(z))*exp(z**2) + + +class _eis(DefinedFunction): + """ + Helper function to make the $\\mathrm{Ei}(z)$ and $\\mathrm{li}(z)$ + functions tractable for the Gruntz algorithm. + + """ + + + def _eval_aseries(self, n, args0, x, logx): + from sympy.series.order import Order + if args0[0] not in (S.Infinity, S.NegativeInfinity): + return super()._eval_aseries(n, args0, x, logx) + + z = self.args[0] + l = [factorial(k) * (1/z)**(k + 1) for k in range(n)] + o = Order(1/z**(n + 1), x) + # It is very inefficient to first add the order and then do the nseries + return (Add(*l))._eval_nseries(x, n, logx) + o + + + def fdiff(self, argindex=1): + if argindex == 1: + z = self.args[0] + return S.One / z - _eis(z) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_intractable(self, z, **kwargs): + return exp(-z)*Ei(z) + + def _eval_as_leading_term(self, x, logx, cdir): + x0 = self.args[0].limit(x, 0) + if x0.is_zero: + f = self._eval_rewrite_as_intractable(*self.args) + return f._eval_as_leading_term(x, logx=logx, cdir=cdir) + return super()._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + x0 = self.args[0].limit(x, 0) + if x0.is_zero: + f = self._eval_rewrite_as_intractable(*self.args) + return f._eval_nseries(x, n, logx) + return super()._eval_nseries(x, n, logx) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/mathieu_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/mathieu_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..66bccd8d3e6dd357e1e0b93fb5cb5ad4c5f1367f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/mathieu_functions.py @@ -0,0 +1,269 @@ +""" This module contains the Mathieu functions. +""" + +from sympy.core.function import DefinedFunction, ArgumentIndexError +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin, cos + + +class MathieuBase(DefinedFunction): + """ + Abstract base class for Mathieu functions. + + This class is meant to reduce code duplication. + + """ + + unbranched = True + + def _eval_conjugate(self): + a, q, z = self.args + return self.func(a.conjugate(), q.conjugate(), z.conjugate()) + + +class mathieus(MathieuBase): + r""" + The Mathieu Sine function $S(a,q,z)$. + + Explanation + =========== + + This function is one solution of the Mathieu differential equation: + + .. math :: + y(x)^{\prime\prime} + (a - 2 q \cos(2 x)) y(x) = 0 + + The other solution is the Mathieu Cosine function. + + Examples + ======== + + >>> from sympy import diff, mathieus + >>> from sympy.abc import a, q, z + + >>> mathieus(a, q, z) + mathieus(a, q, z) + + >>> mathieus(a, 0, z) + sin(sqrt(a)*z) + + >>> diff(mathieus(a, q, z), z) + mathieusprime(a, q, z) + + See Also + ======== + + mathieuc: Mathieu cosine function. + mathieusprime: Derivative of Mathieu sine function. + mathieucprime: Derivative of Mathieu cosine function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Mathieu_function + .. [2] https://dlmf.nist.gov/28 + .. [3] https://mathworld.wolfram.com/MathieuFunction.html + .. [4] https://functions.wolfram.com/MathieuandSpheroidalFunctions/MathieuS/ + + """ + + def fdiff(self, argindex=1): + if argindex == 3: + a, q, z = self.args + return mathieusprime(a, q, z) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, a, q, z): + if q.is_Number and q.is_zero: + return sin(sqrt(a)*z) + # Try to pull out factors of -1 + if z.could_extract_minus_sign(): + return -cls(a, q, -z) + + +class mathieuc(MathieuBase): + r""" + The Mathieu Cosine function $C(a,q,z)$. + + Explanation + =========== + + This function is one solution of the Mathieu differential equation: + + .. math :: + y(x)^{\prime\prime} + (a - 2 q \cos(2 x)) y(x) = 0 + + The other solution is the Mathieu Sine function. + + Examples + ======== + + >>> from sympy import diff, mathieuc + >>> from sympy.abc import a, q, z + + >>> mathieuc(a, q, z) + mathieuc(a, q, z) + + >>> mathieuc(a, 0, z) + cos(sqrt(a)*z) + + >>> diff(mathieuc(a, q, z), z) + mathieucprime(a, q, z) + + See Also + ======== + + mathieus: Mathieu sine function + mathieusprime: Derivative of Mathieu sine function + mathieucprime: Derivative of Mathieu cosine function + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Mathieu_function + .. [2] https://dlmf.nist.gov/28 + .. [3] https://mathworld.wolfram.com/MathieuFunction.html + .. [4] https://functions.wolfram.com/MathieuandSpheroidalFunctions/MathieuC/ + + """ + + def fdiff(self, argindex=1): + if argindex == 3: + a, q, z = self.args + return mathieucprime(a, q, z) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, a, q, z): + if q.is_Number and q.is_zero: + return cos(sqrt(a)*z) + # Try to pull out factors of -1 + if z.could_extract_minus_sign(): + return cls(a, q, -z) + + +class mathieusprime(MathieuBase): + r""" + The derivative $S^{\prime}(a,q,z)$ of the Mathieu Sine function. + + Explanation + =========== + + This function is one solution of the Mathieu differential equation: + + .. math :: + y(x)^{\prime\prime} + (a - 2 q \cos(2 x)) y(x) = 0 + + The other solution is the Mathieu Cosine function. + + Examples + ======== + + >>> from sympy import diff, mathieusprime + >>> from sympy.abc import a, q, z + + >>> mathieusprime(a, q, z) + mathieusprime(a, q, z) + + >>> mathieusprime(a, 0, z) + sqrt(a)*cos(sqrt(a)*z) + + >>> diff(mathieusprime(a, q, z), z) + (-a + 2*q*cos(2*z))*mathieus(a, q, z) + + See Also + ======== + + mathieus: Mathieu sine function + mathieuc: Mathieu cosine function + mathieucprime: Derivative of Mathieu cosine function + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Mathieu_function + .. [2] https://dlmf.nist.gov/28 + .. [3] https://mathworld.wolfram.com/MathieuFunction.html + .. [4] https://functions.wolfram.com/MathieuandSpheroidalFunctions/MathieuSPrime/ + + """ + + def fdiff(self, argindex=1): + if argindex == 3: + a, q, z = self.args + return (2*q*cos(2*z) - a)*mathieus(a, q, z) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, a, q, z): + if q.is_Number and q.is_zero: + return sqrt(a)*cos(sqrt(a)*z) + # Try to pull out factors of -1 + if z.could_extract_minus_sign(): + return cls(a, q, -z) + + +class mathieucprime(MathieuBase): + r""" + The derivative $C^{\prime}(a,q,z)$ of the Mathieu Cosine function. + + Explanation + =========== + + This function is one solution of the Mathieu differential equation: + + .. math :: + y(x)^{\prime\prime} + (a - 2 q \cos(2 x)) y(x) = 0 + + The other solution is the Mathieu Sine function. + + Examples + ======== + + >>> from sympy import diff, mathieucprime + >>> from sympy.abc import a, q, z + + >>> mathieucprime(a, q, z) + mathieucprime(a, q, z) + + >>> mathieucprime(a, 0, z) + -sqrt(a)*sin(sqrt(a)*z) + + >>> diff(mathieucprime(a, q, z), z) + (-a + 2*q*cos(2*z))*mathieuc(a, q, z) + + See Also + ======== + + mathieus: Mathieu sine function + mathieuc: Mathieu cosine function + mathieusprime: Derivative of Mathieu sine function + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Mathieu_function + .. [2] https://dlmf.nist.gov/28 + .. [3] https://mathworld.wolfram.com/MathieuFunction.html + .. [4] https://functions.wolfram.com/MathieuandSpheroidalFunctions/MathieuCPrime/ + + """ + + def fdiff(self, argindex=1): + if argindex == 3: + a, q, z = self.args + return (2*q*cos(2*z) - a)*mathieuc(a, q, z) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, a, q, z): + if q.is_Number and q.is_zero: + return -sqrt(a)*sin(sqrt(a)*z) + # Try to pull out factors of -1 + if z.could_extract_minus_sign(): + return -cls(a, q, -z) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/polynomials.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/polynomials.py new file mode 100644 index 0000000000000000000000000000000000000000..5816baef600baf957c31a9dddaa5571da86d754a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/polynomials.py @@ -0,0 +1,1447 @@ +""" +This module mainly implements special orthogonal polynomials. + +See also functions.combinatorial.numbers which contains some +combinatorial polynomials. + +""" + +from sympy.core import Rational +from sympy.core.function import DefinedFunction, ArgumentIndexError +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.functions.combinatorial.factorials import binomial, factorial, RisingFactorial +from sympy.functions.elementary.complexes import re +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import cos, sec +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import hyper +from sympy.polys.orthopolys import (chebyshevt_poly, chebyshevu_poly, + gegenbauer_poly, hermite_poly, hermite_prob_poly, + jacobi_poly, laguerre_poly, legendre_poly) + +_x = Dummy('x') + + +class OrthogonalPolynomial(DefinedFunction): + """Base class for orthogonal polynomials. + """ + + @classmethod + def _eval_at_order(cls, n, x): + if n.is_integer and n >= 0: + return cls._ortho_poly(int(n), _x).subs(_x, x) + + def _eval_conjugate(self): + return self.func(self.args[0], self.args[1].conjugate()) + +#---------------------------------------------------------------------------- +# Jacobi polynomials +# + + +class jacobi(OrthogonalPolynomial): + r""" + Jacobi polynomial $P_n^{\left(\alpha, \beta\right)}(x)$. + + Explanation + =========== + + ``jacobi(n, alpha, beta, x)`` gives the $n$th Jacobi polynomial + in $x$, $P_n^{\left(\alpha, \beta\right)}(x)$. + + The Jacobi polynomials are orthogonal on $[-1, 1]$ with respect + to the weight $\left(1-x\right)^\alpha \left(1+x\right)^\beta$. + + Examples + ======== + + >>> from sympy import jacobi, S, conjugate, diff + >>> from sympy.abc import a, b, n, x + + >>> jacobi(0, a, b, x) + 1 + >>> jacobi(1, a, b, x) + a/2 - b/2 + x*(a/2 + b/2 + 1) + >>> jacobi(2, a, b, x) + a**2/8 - a*b/4 - a/8 + b**2/8 - b/8 + x**2*(a**2/8 + a*b/4 + 7*a/8 + b**2/8 + 7*b/8 + 3/2) + x*(a**2/4 + 3*a/4 - b**2/4 - 3*b/4) - 1/2 + + >>> jacobi(n, a, b, x) + jacobi(n, a, b, x) + + >>> jacobi(n, a, a, x) + RisingFactorial(a + 1, n)*gegenbauer(n, + a + 1/2, x)/RisingFactorial(2*a + 1, n) + + >>> jacobi(n, 0, 0, x) + legendre(n, x) + + >>> jacobi(n, S(1)/2, S(1)/2, x) + RisingFactorial(3/2, n)*chebyshevu(n, x)/factorial(n + 1) + + >>> jacobi(n, -S(1)/2, -S(1)/2, x) + RisingFactorial(1/2, n)*chebyshevt(n, x)/factorial(n) + + >>> jacobi(n, a, b, -x) + (-1)**n*jacobi(n, b, a, x) + + >>> jacobi(n, a, b, 0) + gamma(a + n + 1)*hyper((-n, -b - n), (a + 1,), -1)/(2**n*factorial(n)*gamma(a + 1)) + >>> jacobi(n, a, b, 1) + RisingFactorial(a + 1, n)/factorial(n) + + >>> conjugate(jacobi(n, a, b, x)) + jacobi(n, conjugate(a), conjugate(b), conjugate(x)) + + >>> diff(jacobi(n,a,b,x), x) + (a/2 + b/2 + n/2 + 1/2)*jacobi(n - 1, a + 1, b + 1, x) + + See Also + ======== + + gegenbauer, + chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly, + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Jacobi_polynomials + .. [2] https://mathworld.wolfram.com/JacobiPolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/JacobiP/ + + """ + + @classmethod + def eval(cls, n, a, b, x): + # Simplify to other polynomials + # P^{a, a}_n(x) + if a == b: + if a == Rational(-1, 2): + return RisingFactorial(S.Half, n) / factorial(n) * chebyshevt(n, x) + elif a.is_zero: + return legendre(n, x) + elif a == S.Half: + return RisingFactorial(3*S.Half, n) / factorial(n + 1) * chebyshevu(n, x) + else: + return RisingFactorial(a + 1, n) / RisingFactorial(2*a + 1, n) * gegenbauer(n, a + S.Half, x) + elif b == -a: + # P^{a, -a}_n(x) + return gamma(n + a + 1) / gamma(n + 1) * (1 + x)**(a/2) / (1 - x)**(a/2) * assoc_legendre(n, -a, x) + + if not n.is_Number: + # Symbolic result P^{a,b}_n(x) + # P^{a,b}_n(-x) ---> (-1)**n * P^{b,a}_n(-x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * jacobi(n, b, a, -x) + # We can evaluate for some special values of x + if x.is_zero: + return (2**(-n) * gamma(a + n + 1) / (gamma(a + 1) * factorial(n)) * + hyper([-b - n, -n], [a + 1], -1)) + if x == S.One: + return RisingFactorial(a + 1, n) / factorial(n) + elif x is S.Infinity: + if n.is_positive: + # Make sure a+b+2*n \notin Z + if (a + b + 2*n).is_integer: + raise ValueError("Error. a + b + 2*n should not be an integer.") + return RisingFactorial(a + b + n + 1, n) * S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + return jacobi_poly(n, a, b, x) + + def fdiff(self, argindex=4): + from sympy.concrete.summations import Sum + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt a + n, a, b, x = self.args + k = Dummy("k") + f1 = 1 / (a + b + n + k + 1) + f2 = ((a + b + 2*k + 1) * RisingFactorial(b + k + 1, n - k) / + ((n - k) * RisingFactorial(a + b + k + 1, n - k))) + return Sum(f1 * (jacobi(n, a, b, x) + f2*jacobi(k, a, b, x)), (k, 0, n - 1)) + elif argindex == 3: + # Diff wrt b + n, a, b, x = self.args + k = Dummy("k") + f1 = 1 / (a + b + n + k + 1) + f2 = (-1)**(n - k) * ((a + b + 2*k + 1) * RisingFactorial(a + k + 1, n - k) / + ((n - k) * RisingFactorial(a + b + k + 1, n - k))) + return Sum(f1 * (jacobi(n, a, b, x) + f2*jacobi(k, a, b, x)), (k, 0, n - 1)) + elif argindex == 4: + # Diff wrt x + n, a, b, x = self.args + return S.Half * (a + b + n + 1) * jacobi(n - 1, a + 1, b + 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, a, b, x, **kwargs): + from sympy.concrete.summations import Sum + # Make sure n \in N + if n.is_negative or n.is_integer is False: + raise ValueError("Error: n should be a non-negative integer.") + k = Dummy("k") + kern = (RisingFactorial(-n, k) * RisingFactorial(a + b + n + 1, k) * RisingFactorial(a + k + 1, n - k) / + factorial(k) * ((1 - x)/2)**k) + return 1 / factorial(n) * Sum(kern, (k, 0, n)) + + def _eval_rewrite_as_polynomial(self, n, a, b, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, a, b, x, **kwargs) + + def _eval_conjugate(self): + n, a, b, x = self.args + return self.func(n, a.conjugate(), b.conjugate(), x.conjugate()) + + +def jacobi_normalized(n, a, b, x): + r""" + Jacobi polynomial $P_n^{\left(\alpha, \beta\right)}(x)$. + + Explanation + =========== + + ``jacobi_normalized(n, alpha, beta, x)`` gives the $n$th + Jacobi polynomial in $x$, $P_n^{\left(\alpha, \beta\right)}(x)$. + + The Jacobi polynomials are orthogonal on $[-1, 1]$ with respect + to the weight $\left(1-x\right)^\alpha \left(1+x\right)^\beta$. + + This functions returns the polynomials normilzed: + + .. math:: + + \int_{-1}^{1} + P_m^{\left(\alpha, \beta\right)}(x) + P_n^{\left(\alpha, \beta\right)}(x) + (1-x)^{\alpha} (1+x)^{\beta} \mathrm{d}x + = \delta_{m,n} + + Examples + ======== + + >>> from sympy import jacobi_normalized + >>> from sympy.abc import n,a,b,x + + >>> jacobi_normalized(n, a, b, x) + jacobi(n, a, b, x)/sqrt(2**(a + b + 1)*gamma(a + n + 1)*gamma(b + n + 1)/((a + b + 2*n + 1)*factorial(n)*gamma(a + b + n + 1))) + + Parameters + ========== + + n : integer degree of polynomial + + a : alpha value + + b : beta value + + x : symbol + + See Also + ======== + + gegenbauer, + chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly, + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Jacobi_polynomials + .. [2] https://mathworld.wolfram.com/JacobiPolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/JacobiP/ + + """ + nfactor = (S(2)**(a + b + 1) * (gamma(n + a + 1) * gamma(n + b + 1)) + / (2*n + a + b + 1) / (factorial(n) * gamma(n + a + b + 1))) + + return jacobi(n, a, b, x) / sqrt(nfactor) + + +#---------------------------------------------------------------------------- +# Gegenbauer polynomials +# + + +class gegenbauer(OrthogonalPolynomial): + r""" + Gegenbauer polynomial $C_n^{\left(\alpha\right)}(x)$. + + Explanation + =========== + + ``gegenbauer(n, alpha, x)`` gives the $n$th Gegenbauer polynomial + in $x$, $C_n^{\left(\alpha\right)}(x)$. + + The Gegenbauer polynomials are orthogonal on $[-1, 1]$ with + respect to the weight $\left(1-x^2\right)^{\alpha-\frac{1}{2}}$. + + Examples + ======== + + >>> from sympy import gegenbauer, conjugate, diff + >>> from sympy.abc import n,a,x + >>> gegenbauer(0, a, x) + 1 + >>> gegenbauer(1, a, x) + 2*a*x + >>> gegenbauer(2, a, x) + -a + x**2*(2*a**2 + 2*a) + >>> gegenbauer(3, a, x) + x**3*(4*a**3/3 + 4*a**2 + 8*a/3) + x*(-2*a**2 - 2*a) + + >>> gegenbauer(n, a, x) + gegenbauer(n, a, x) + >>> gegenbauer(n, a, -x) + (-1)**n*gegenbauer(n, a, x) + + >>> gegenbauer(n, a, 0) + 2**n*sqrt(pi)*gamma(a + n/2)/(gamma(a)*gamma(1/2 - n/2)*gamma(n + 1)) + >>> gegenbauer(n, a, 1) + gamma(2*a + n)/(gamma(2*a)*gamma(n + 1)) + + >>> conjugate(gegenbauer(n, a, x)) + gegenbauer(n, conjugate(a), conjugate(x)) + + >>> diff(gegenbauer(n, a, x), x) + 2*a*gegenbauer(n - 1, a + 1, x) + + See Also + ======== + + jacobi, + chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Gegenbauer_polynomials + .. [2] https://mathworld.wolfram.com/GegenbauerPolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/GegenbauerC3/ + + """ + + @classmethod + def eval(cls, n, a, x): + # For negative n the polynomials vanish + # See https://functions.wolfram.com/Polynomials/GegenbauerC3/03/01/03/0012/ + if n.is_negative: + return S.Zero + + # Some special values for fixed a + if a == S.Half: + return legendre(n, x) + elif a == S.One: + return chebyshevu(n, x) + elif a == S.NegativeOne: + return S.Zero + + if not n.is_Number: + # Handle this before the general sign extraction rule + if x == S.NegativeOne: + if (re(a) > S.Half) == True: + return S.ComplexInfinity + else: + return (cos(S.Pi*(a+n)) * sec(S.Pi*a) * gamma(2*a+n) / + (gamma(2*a) * gamma(n+1))) + + # Symbolic result C^a_n(x) + # C^a_n(-x) ---> (-1)**n * C^a_n(x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * gegenbauer(n, a, -x) + # We can evaluate for some special values of x + if x.is_zero: + return (2**n * sqrt(S.Pi) * gamma(a + S.Half*n) / + (gamma((1 - n)/2) * gamma(n + 1) * gamma(a)) ) + if x == S.One: + return gamma(2*a + n) / (gamma(2*a) * gamma(n + 1)) + elif x is S.Infinity: + if n.is_positive: + return RisingFactorial(a, n) * S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + return gegenbauer_poly(n, a, x) + + def fdiff(self, argindex=3): + from sympy.concrete.summations import Sum + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt a + n, a, x = self.args + k = Dummy("k") + factor1 = 2 * (1 + (-1)**(n - k)) * (k + a) / ((k + + n + 2*a) * (n - k)) + factor2 = 2*(k + 1) / ((k + 2*a) * (2*k + 2*a + 1)) + \ + 2 / (k + n + 2*a) + kern = factor1*gegenbauer(k, a, x) + factor2*gegenbauer(n, a, x) + return Sum(kern, (k, 0, n - 1)) + elif argindex == 3: + # Diff wrt x + n, a, x = self.args + return 2*a*gegenbauer(n - 1, a + 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, a, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = ((-1)**k * RisingFactorial(a, n - k) * (2*x)**(n - 2*k) / + (factorial(k) * factorial(n - 2*k))) + return Sum(kern, (k, 0, floor(n/2))) + + def _eval_rewrite_as_polynomial(self, n, a, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, a, x, **kwargs) + + def _eval_conjugate(self): + n, a, x = self.args + return self.func(n, a.conjugate(), x.conjugate()) + +#---------------------------------------------------------------------------- +# Chebyshev polynomials of first and second kind +# + + +class chebyshevt(OrthogonalPolynomial): + r""" + Chebyshev polynomial of the first kind, $T_n(x)$. + + Explanation + =========== + + ``chebyshevt(n, x)`` gives the $n$th Chebyshev polynomial (of the first + kind) in $x$, $T_n(x)$. + + The Chebyshev polynomials of the first kind are orthogonal on + $[-1, 1]$ with respect to the weight $\frac{1}{\sqrt{1-x^2}}$. + + Examples + ======== + + >>> from sympy import chebyshevt, diff + >>> from sympy.abc import n,x + >>> chebyshevt(0, x) + 1 + >>> chebyshevt(1, x) + x + >>> chebyshevt(2, x) + 2*x**2 - 1 + + >>> chebyshevt(n, x) + chebyshevt(n, x) + >>> chebyshevt(n, -x) + (-1)**n*chebyshevt(n, x) + >>> chebyshevt(-n, x) + chebyshevt(n, x) + + >>> chebyshevt(n, 0) + cos(pi*n/2) + >>> chebyshevt(n, -1) + (-1)**n + + >>> diff(chebyshevt(n, x), x) + n*chebyshevu(n - 1, x) + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Chebyshev_polynomial + .. [2] https://mathworld.wolfram.com/ChebyshevPolynomialoftheFirstKind.html + .. [3] https://mathworld.wolfram.com/ChebyshevPolynomialoftheSecondKind.html + .. [4] https://functions.wolfram.com/Polynomials/ChebyshevT/ + .. [5] https://functions.wolfram.com/Polynomials/ChebyshevU/ + + """ + + _ortho_poly = staticmethod(chebyshevt_poly) + + @classmethod + def eval(cls, n, x): + if not n.is_Number: + # Symbolic result T_n(x) + # T_n(-x) ---> (-1)**n * T_n(x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * chebyshevt(n, -x) + # T_{-n}(x) ---> T_n(x) + if n.could_extract_minus_sign(): + return chebyshevt(-n, x) + # We can evaluate for some special values of x + if x.is_zero: + return cos(S.Half * S.Pi * n) + if x == S.One: + return S.One + elif x is S.Infinity: + return S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + if n.is_negative: + # T_{-n}(x) == T_n(x) + return cls._eval_at_order(-n, x) + else: + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt x + n, x = self.args + return n * chebyshevu(n - 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = binomial(n, 2*k) * (x**2 - 1)**k * x**(n - 2*k) + return Sum(kern, (k, 0, floor(n/2))) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + +class chebyshevu(OrthogonalPolynomial): + r""" + Chebyshev polynomial of the second kind, $U_n(x)$. + + Explanation + =========== + + ``chebyshevu(n, x)`` gives the $n$th Chebyshev polynomial of the second + kind in x, $U_n(x)$. + + The Chebyshev polynomials of the second kind are orthogonal on + $[-1, 1]$ with respect to the weight $\sqrt{1-x^2}$. + + Examples + ======== + + >>> from sympy import chebyshevu, diff + >>> from sympy.abc import n,x + >>> chebyshevu(0, x) + 1 + >>> chebyshevu(1, x) + 2*x + >>> chebyshevu(2, x) + 4*x**2 - 1 + + >>> chebyshevu(n, x) + chebyshevu(n, x) + >>> chebyshevu(n, -x) + (-1)**n*chebyshevu(n, x) + >>> chebyshevu(-n, x) + -chebyshevu(n - 2, x) + + >>> chebyshevu(n, 0) + cos(pi*n/2) + >>> chebyshevu(n, 1) + n + 1 + + >>> diff(chebyshevu(n, x), x) + (-x*chebyshevu(n, x) + (n + 1)*chebyshevt(n + 1, x))/(x**2 - 1) + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Chebyshev_polynomial + .. [2] https://mathworld.wolfram.com/ChebyshevPolynomialoftheFirstKind.html + .. [3] https://mathworld.wolfram.com/ChebyshevPolynomialoftheSecondKind.html + .. [4] https://functions.wolfram.com/Polynomials/ChebyshevT/ + .. [5] https://functions.wolfram.com/Polynomials/ChebyshevU/ + + """ + + _ortho_poly = staticmethod(chebyshevu_poly) + + @classmethod + def eval(cls, n, x): + if not n.is_Number: + # Symbolic result U_n(x) + # U_n(-x) ---> (-1)**n * U_n(x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * chebyshevu(n, -x) + # U_{-n}(x) ---> -U_{n-2}(x) + if n.could_extract_minus_sign(): + if n == S.NegativeOne: + # n can not be -1 here + return S.Zero + elif not (-n - 2).could_extract_minus_sign(): + return -chebyshevu(-n - 2, x) + # We can evaluate for some special values of x + if x.is_zero: + return cos(S.Half * S.Pi * n) + if x == S.One: + return S.One + n + elif x is S.Infinity: + return S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + if n.is_negative: + # U_{-n}(x) ---> -U_{n-2}(x) + if n == S.NegativeOne: + return S.Zero + else: + return -cls._eval_at_order(-n - 2, x) + else: + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt x + n, x = self.args + return ((n + 1) * chebyshevt(n + 1, x) - x * chebyshevu(n, x)) / (x**2 - 1) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = S.NegativeOne**k * factorial( + n - k) * (2*x)**(n - 2*k) / (factorial(k) * factorial(n - 2*k)) + return Sum(kern, (k, 0, floor(n/2))) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + +class chebyshevt_root(DefinedFunction): + r""" + ``chebyshev_root(n, k)`` returns the $k$th root (indexed from zero) of + the $n$th Chebyshev polynomial of the first kind; that is, if + $0 \le k < n$, ``chebyshevt(n, chebyshevt_root(n, k)) == 0``. + + Examples + ======== + + >>> from sympy import chebyshevt, chebyshevt_root + >>> chebyshevt_root(3, 2) + -sqrt(3)/2 + >>> chebyshevt(3, chebyshevt_root(3, 2)) + 0 + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + """ + + @classmethod + def eval(cls, n, k): + if not ((0 <= k) and (k < n)): + raise ValueError("must have 0 <= k < n, " + "got k = %s and n = %s" % (k, n)) + return cos(S.Pi*(2*k + 1)/(2*n)) + + +class chebyshevu_root(DefinedFunction): + r""" + ``chebyshevu_root(n, k)`` returns the $k$th root (indexed from zero) of the + $n$th Chebyshev polynomial of the second kind; that is, if $0 \le k < n$, + ``chebyshevu(n, chebyshevu_root(n, k)) == 0``. + + Examples + ======== + + >>> from sympy import chebyshevu, chebyshevu_root + >>> chebyshevu_root(3, 2) + -sqrt(2)/2 + >>> chebyshevu(3, chebyshevu_root(3, 2)) + 0 + + See Also + ======== + + chebyshevt, chebyshevt_root, chebyshevu, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + """ + + + @classmethod + def eval(cls, n, k): + if not ((0 <= k) and (k < n)): + raise ValueError("must have 0 <= k < n, " + "got k = %s and n = %s" % (k, n)) + return cos(S.Pi*(k + 1)/(n + 1)) + +#---------------------------------------------------------------------------- +# Legendre polynomials and Associated Legendre polynomials +# + + +class legendre(OrthogonalPolynomial): + r""" + ``legendre(n, x)`` gives the $n$th Legendre polynomial of $x$, $P_n(x)$ + + Explanation + =========== + + The Legendre polynomials are orthogonal on $[-1, 1]$ with respect to + the constant weight 1. They satisfy $P_n(1) = 1$ for all $n$; further, + $P_n$ is odd for odd $n$ and even for even $n$. + + Examples + ======== + + >>> from sympy import legendre, diff + >>> from sympy.abc import x, n + >>> legendre(0, x) + 1 + >>> legendre(1, x) + x + >>> legendre(2, x) + 3*x**2/2 - 1/2 + >>> legendre(n, x) + legendre(n, x) + >>> diff(legendre(n,x), x) + n*(x*legendre(n, x) - legendre(n - 1, x))/(x**2 - 1) + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + assoc_legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Legendre_polynomial + .. [2] https://mathworld.wolfram.com/LegendrePolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/LegendreP/ + .. [4] https://functions.wolfram.com/Polynomials/LegendreP2/ + + """ + + _ortho_poly = staticmethod(legendre_poly) + + @classmethod + def eval(cls, n, x): + if not n.is_Number: + # Symbolic result L_n(x) + # L_n(-x) ---> (-1)**n * L_n(x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * legendre(n, -x) + # L_{-n}(x) ---> L_{n-1}(x) + if n.could_extract_minus_sign() and not(-n - 1).could_extract_minus_sign(): + return legendre(-n - S.One, x) + # We can evaluate for some special values of x + if x.is_zero: + return sqrt(S.Pi)/(gamma(S.Half - n/2)*gamma(S.One + n/2)) + elif x == S.One: + return S.One + elif x is S.Infinity: + return S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial; + # L_{-n}(x) ---> L_{n-1}(x) + if n.is_negative: + n = -n - S.One + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt x + # Find better formula, this is unsuitable for x = +/-1 + # https://www.autodiff.org/ad16/Oral/Buecker_Legendre.pdf says + # at x = 1: + # n*(n + 1)/2 , m = 0 + # oo , m = 1 + # -(n-1)*n*(n+1)*(n+2)/4 , m = 2 + # 0 , m = 3, 4, ..., n + # + # at x = -1 + # (-1)**(n+1)*n*(n + 1)/2 , m = 0 + # (-1)**n*oo , m = 1 + # (-1)**n*(n-1)*n*(n+1)*(n+2)/4 , m = 2 + # 0 , m = 3, 4, ..., n + n, x = self.args + return n/(x**2 - 1)*(x*legendre(n, x) - legendre(n - 1, x)) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = S.NegativeOne**k*binomial(n, k)**2*((1 + x)/2)**(n - k)*((1 - x)/2)**k + return Sum(kern, (k, 0, n)) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + +class assoc_legendre(DefinedFunction): + r""" + ``assoc_legendre(n, m, x)`` gives $P_n^m(x)$, where $n$ and $m$ are + the degree and order or an expression which is related to the nth + order Legendre polynomial, $P_n(x)$ in the following manner: + + .. math:: + P_n^m(x) = (-1)^m (1 - x^2)^{\frac{m}{2}} + \frac{\mathrm{d}^m P_n(x)}{\mathrm{d} x^m} + + Explanation + =========== + + Associated Legendre polynomials are orthogonal on $[-1, 1]$ with: + + - weight $= 1$ for the same $m$ and different $n$. + - weight $= \frac{1}{1-x^2}$ for the same $n$ and different $m$. + + Examples + ======== + + >>> from sympy import assoc_legendre + >>> from sympy.abc import x, m, n + >>> assoc_legendre(0,0, x) + 1 + >>> assoc_legendre(1,0, x) + x + >>> assoc_legendre(1,1, x) + -sqrt(1 - x**2) + >>> assoc_legendre(n,m,x) + assoc_legendre(n, m, x) + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, + hermite, hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Associated_Legendre_polynomials + .. [2] https://mathworld.wolfram.com/LegendrePolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/LegendreP/ + .. [4] https://functions.wolfram.com/Polynomials/LegendreP2/ + + """ + + @classmethod + def _eval_at_order(cls, n, m): + P = legendre_poly(n, _x, polys=True).diff((_x, m)) + return S.NegativeOne**m * (1 - _x**2)**Rational(m, 2) * P.as_expr() + + @classmethod + def eval(cls, n, m, x): + if m.could_extract_minus_sign(): + # P^{-m}_n ---> F * P^m_n + return S.NegativeOne**(-m) * (factorial(m + n)/factorial(n - m)) * assoc_legendre(n, -m, x) + if m == 0: + # P^0_n ---> L_n + return legendre(n, x) + if x == 0: + return 2**m*sqrt(S.Pi) / (gamma((1 - m - n)/2)*gamma(1 - (m - n)/2)) + if n.is_Number and m.is_Number and n.is_integer and m.is_integer: + if n.is_negative: + raise ValueError("%s : 1st index must be nonnegative integer (got %r)" % (cls, n)) + if abs(m) > n: + raise ValueError("%s : abs('2nd index') must be <= '1st index' (got %r, %r)" % (cls, n, m)) + return cls._eval_at_order(int(n), abs(int(m))).subs(_x, x) + + def fdiff(self, argindex=3): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt m + raise ArgumentIndexError(self, argindex) + elif argindex == 3: + # Diff wrt x + # Find better formula, this is unsuitable for x = 1 + n, m, x = self.args + return 1/(x**2 - 1)*(x*n*assoc_legendre(n, m, x) - (m + n)*assoc_legendre(n - 1, m, x)) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, m, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = factorial(2*n - 2*k)/(2**n*factorial(n - k)*factorial( + k)*factorial(n - 2*k - m))*S.NegativeOne**k*x**(n - m - 2*k) + return (1 - x**2)**(m/2) * Sum(kern, (k, 0, floor((n - m)*S.Half))) + + def _eval_rewrite_as_polynomial(self, n, m, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, m, x, **kwargs) + + def _eval_conjugate(self): + n, m, x = self.args + return self.func(n, m.conjugate(), x.conjugate()) + +#---------------------------------------------------------------------------- +# Hermite polynomials +# + + +class hermite(OrthogonalPolynomial): + r""" + ``hermite(n, x)`` gives the $n$th Hermite polynomial in $x$, $H_n(x)$. + + Explanation + =========== + + The Hermite polynomials are orthogonal on $(-\infty, \infty)$ + with respect to the weight $\exp\left(-x^2\right)$. + + Examples + ======== + + >>> from sympy import hermite, diff + >>> from sympy.abc import x, n + >>> hermite(0, x) + 1 + >>> hermite(1, x) + 2*x + >>> hermite(2, x) + 4*x**2 - 2 + >>> hermite(n, x) + hermite(n, x) + >>> diff(hermite(n,x), x) + 2*n*hermite(n - 1, x) + >>> hermite(n, -x) + (-1)**n*hermite(n, x) + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite_prob, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hermite_polynomial + .. [2] https://mathworld.wolfram.com/HermitePolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/HermiteH/ + + """ + + _ortho_poly = staticmethod(hermite_poly) + + @classmethod + def eval(cls, n, x): + if not n.is_Number: + # Symbolic result H_n(x) + # H_n(-x) ---> (-1)**n * H_n(x) + if x.could_extract_minus_sign(): + return S.NegativeOne**n * hermite(n, -x) + # We can evaluate for some special values of x + if x.is_zero: + return 2**n * sqrt(S.Pi) / gamma((S.One - n)/2) + elif x is S.Infinity: + return S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + if n.is_negative: + raise ValueError( + "The index n must be nonnegative integer (got %r)" % n) + else: + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt x + n, x = self.args + return 2*n*hermite(n - 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = S.NegativeOne**k / (factorial(k)*factorial(n - 2*k)) * (2*x)**(n - 2*k) + return factorial(n)*Sum(kern, (k, 0, floor(n/2))) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + def _eval_rewrite_as_hermite_prob(self, n, x, **kwargs): + return sqrt(2)**n * hermite_prob(n, x*sqrt(2)) + + +class hermite_prob(OrthogonalPolynomial): + r""" + ``hermite_prob(n, x)`` gives the $n$th probabilist's Hermite polynomial + in $x$, $He_n(x)$. + + Explanation + =========== + + The probabilist's Hermite polynomials are orthogonal on $(-\infty, \infty)$ + with respect to the weight $\exp\left(-\frac{x^2}{2}\right)$. They are monic + polynomials, related to the plain Hermite polynomials (:py:class:`~.hermite`) by + + .. math :: He_n(x) = 2^{-n/2} H_n(x/\sqrt{2}) + + Examples + ======== + + >>> from sympy import hermite_prob, diff, I + >>> from sympy.abc import x, n + >>> hermite_prob(1, x) + x + >>> hermite_prob(5, x) + x**5 - 10*x**3 + 15*x + >>> diff(hermite_prob(n,x), x) + n*hermite_prob(n - 1, x) + >>> hermite_prob(n, -x) + (-1)**n*hermite_prob(n, x) + + The sum of absolute values of coefficients of $He_n(x)$ is the number of + matchings in the complete graph $K_n$ or telephone number, A000085 in the OEIS: + + >>> [hermite_prob(n,I) / I**n for n in range(11)] + [1, 1, 2, 4, 10, 26, 76, 232, 764, 2620, 9496] + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, + laguerre, assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hermite_polynomial + .. [2] https://mathworld.wolfram.com/HermitePolynomial.html + """ + + _ortho_poly = staticmethod(hermite_prob_poly) + + @classmethod + def eval(cls, n, x): + if not n.is_Number: + if x.could_extract_minus_sign(): + return S.NegativeOne**n * hermite_prob(n, -x) + if x.is_zero: + return sqrt(S.Pi) / gamma((S.One-n) / 2) + elif x is S.Infinity: + return S.Infinity + else: + if n.is_negative: + ValueError("n must be a nonnegative integer, not %r" % n) + else: + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 2: + n, x = self.args + return n*hermite_prob(n-1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + k = Dummy("k") + kern = (-S.Half)**k * x**(n-2*k) / (factorial(k) * factorial(n-2*k)) + return factorial(n)*Sum(kern, (k, 0, floor(n/2))) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + def _eval_rewrite_as_hermite(self, n, x, **kwargs): + return sqrt(2)**(-n) * hermite(n, x/sqrt(2)) + + +#---------------------------------------------------------------------------- +# Laguerre polynomials +# + + +class laguerre(OrthogonalPolynomial): + r""" + Returns the $n$th Laguerre polynomial in $x$, $L_n(x)$. + + Examples + ======== + + >>> from sympy import laguerre, diff + >>> from sympy.abc import x, n + >>> laguerre(0, x) + 1 + >>> laguerre(1, x) + 1 - x + >>> laguerre(2, x) + x**2/2 - 2*x + 1 + >>> laguerre(3, x) + -x**3/6 + 3*x**2/2 - 3*x + 1 + + >>> laguerre(n, x) + laguerre(n, x) + + >>> diff(laguerre(n, x), x) + -assoc_laguerre(n - 1, 1, x) + + Parameters + ========== + + n : int + Degree of Laguerre polynomial. Must be `n \ge 0`. + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + assoc_laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Laguerre_polynomial + .. [2] https://mathworld.wolfram.com/LaguerrePolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/LaguerreL/ + .. [4] https://functions.wolfram.com/Polynomials/LaguerreL3/ + + """ + + _ortho_poly = staticmethod(laguerre_poly) + + @classmethod + def eval(cls, n, x): + if n.is_integer is False: + raise ValueError("Error: n should be an integer.") + if not n.is_Number: + # Symbolic result L_n(x) + # L_{n}(-x) ---> exp(-x) * L_{-n-1}(x) + # L_{-n}(x) ---> exp(x) * L_{n-1}(-x) + if n.could_extract_minus_sign() and not(-n - 1).could_extract_minus_sign(): + return exp(x)*laguerre(-n - 1, -x) + # We can evaluate for some special values of x + if x.is_zero: + return S.One + elif x is S.NegativeInfinity: + return S.Infinity + elif x is S.Infinity: + return S.NegativeOne**n * S.Infinity + else: + if n.is_negative: + return exp(x)*laguerre(-n - 1, -x) + else: + return cls._eval_at_order(n, x) + + def fdiff(self, argindex=2): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt x + n, x = self.args + return -assoc_laguerre(n - 1, 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, x, **kwargs): + from sympy.concrete.summations import Sum + # Make sure n \in N_0 + if n.is_negative: + return exp(x) * self._eval_rewrite_as_Sum(-n - 1, -x, **kwargs) + if n.is_integer is False: + raise ValueError("Error: n should be an integer.") + k = Dummy("k") + kern = RisingFactorial(-n, k) / factorial(k)**2 * x**k + return Sum(kern, (k, 0, n)) + + def _eval_rewrite_as_polynomial(self, n, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, x, **kwargs) + + +class assoc_laguerre(OrthogonalPolynomial): + r""" + Returns the $n$th generalized Laguerre polynomial in $x$, $L_n(x)$. + + Examples + ======== + + >>> from sympy import assoc_laguerre, diff + >>> from sympy.abc import x, n, a + >>> assoc_laguerre(0, a, x) + 1 + >>> assoc_laguerre(1, a, x) + a - x + 1 + >>> assoc_laguerre(2, a, x) + a**2/2 + 3*a/2 + x**2/2 + x*(-a - 2) + 1 + >>> assoc_laguerre(3, a, x) + a**3/6 + a**2 + 11*a/6 - x**3/6 + x**2*(a/2 + 3/2) + + x*(-a**2/2 - 5*a/2 - 3) + 1 + + >>> assoc_laguerre(n, a, 0) + binomial(a + n, a) + + >>> assoc_laguerre(n, a, x) + assoc_laguerre(n, a, x) + + >>> assoc_laguerre(n, 0, x) + laguerre(n, x) + + >>> diff(assoc_laguerre(n, a, x), x) + -assoc_laguerre(n - 1, a + 1, x) + + >>> diff(assoc_laguerre(n, a, x), a) + Sum(assoc_laguerre(_k, a, x)/(-a + n), (_k, 0, n - 1)) + + Parameters + ========== + + n : int + Degree of Laguerre polynomial. Must be `n \ge 0`. + + alpha : Expr + Arbitrary expression. For ``alpha=0`` regular Laguerre + polynomials will be generated. + + See Also + ======== + + jacobi, gegenbauer, + chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, + legendre, assoc_legendre, + hermite, hermite_prob, + laguerre, + sympy.polys.orthopolys.jacobi_poly + sympy.polys.orthopolys.gegenbauer_poly + sympy.polys.orthopolys.chebyshevt_poly + sympy.polys.orthopolys.chebyshevu_poly + sympy.polys.orthopolys.hermite_poly + sympy.polys.orthopolys.hermite_prob_poly + sympy.polys.orthopolys.legendre_poly + sympy.polys.orthopolys.laguerre_poly + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Laguerre_polynomial#Generalized_Laguerre_polynomials + .. [2] https://mathworld.wolfram.com/AssociatedLaguerrePolynomial.html + .. [3] https://functions.wolfram.com/Polynomials/LaguerreL/ + .. [4] https://functions.wolfram.com/Polynomials/LaguerreL3/ + + """ + + @classmethod + def eval(cls, n, alpha, x): + # L_{n}^{0}(x) ---> L_{n}(x) + if alpha.is_zero: + return laguerre(n, x) + + if not n.is_Number: + # We can evaluate for some special values of x + if x.is_zero: + return binomial(n + alpha, alpha) + elif x is S.Infinity and n > 0: + return S.NegativeOne**n * S.Infinity + elif x is S.NegativeInfinity and n > 0: + return S.Infinity + else: + # n is a given fixed integer, evaluate into polynomial + if n.is_negative: + raise ValueError( + "The index n must be nonnegative integer (got %r)" % n) + else: + return laguerre_poly(n, x, alpha) + + def fdiff(self, argindex=3): + from sympy.concrete.summations import Sum + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt alpha + n, alpha, x = self.args + k = Dummy("k") + return Sum(assoc_laguerre(k, alpha, x) / (n - alpha), (k, 0, n - 1)) + elif argindex == 3: + # Diff wrt x + n, alpha, x = self.args + return -assoc_laguerre(n - 1, alpha + 1, x) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Sum(self, n, alpha, x, **kwargs): + from sympy.concrete.summations import Sum + # Make sure n \in N_0 + if n.is_negative or n.is_integer is False: + raise ValueError("Error: n should be a non-negative integer.") + k = Dummy("k") + kern = RisingFactorial( + -n, k) / (gamma(k + alpha + 1) * factorial(k)) * x**k + return gamma(n + alpha + 1) / factorial(n) * Sum(kern, (k, 0, n)) + + def _eval_rewrite_as_polynomial(self, n, alpha, x, **kwargs): + # This function is just kept for backwards compatibility + # but should not be used + return self._eval_rewrite_as_Sum(n, alpha, x, **kwargs) + + def _eval_conjugate(self): + n, alpha, x = self.args + return self.func(n, alpha.conjugate(), x.conjugate()) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/singularity_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/singularity_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..a69026e6e657b1131880b47cb32202b6825b7158 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/singularity_functions.py @@ -0,0 +1,235 @@ +from sympy.core import S, oo, diff +from sympy.core.function import DefinedFunction, ArgumentIndexError +from sympy.core.logic import fuzzy_not +from sympy.core.relational import Eq +from sympy.functions.elementary.complexes import im +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.delta_functions import Heaviside + +############################################################################### +############################# SINGULARITY FUNCTION ############################ +############################################################################### + + +class SingularityFunction(DefinedFunction): + r""" + Singularity functions are a class of discontinuous functions. + + Explanation + =========== + + Singularity functions take a variable, an offset, and an exponent as + arguments. These functions are represented using Macaulay brackets as: + + SingularityFunction(x, a, n) := ^n + + The singularity function will automatically evaluate to + ``Derivative(DiracDelta(x - a), x, -n - 1)`` if ``n < 0`` + and ``(x - a)**n*Heaviside(x - a, 1)`` if ``n >= 0``. + + Examples + ======== + + >>> from sympy import SingularityFunction, diff, Piecewise, DiracDelta, Heaviside, Symbol + >>> from sympy.abc import x, a, n + >>> SingularityFunction(x, a, n) + SingularityFunction(x, a, n) + >>> y = Symbol('y', positive=True) + >>> n = Symbol('n', nonnegative=True) + >>> SingularityFunction(y, -10, n) + (y + 10)**n + >>> y = Symbol('y', negative=True) + >>> SingularityFunction(y, 10, n) + 0 + >>> SingularityFunction(x, 4, -1).subs(x, 4) + oo + >>> SingularityFunction(x, 10, -2).subs(x, 10) + oo + >>> SingularityFunction(4, 1, 5) + 243 + >>> diff(SingularityFunction(x, 1, 5) + SingularityFunction(x, 1, 4), x) + 4*SingularityFunction(x, 1, 3) + 5*SingularityFunction(x, 1, 4) + >>> diff(SingularityFunction(x, 4, 0), x, 2) + SingularityFunction(x, 4, -2) + >>> SingularityFunction(x, 4, 5).rewrite(Piecewise) + Piecewise(((x - 4)**5, x >= 4), (0, True)) + >>> expr = SingularityFunction(x, a, n) + >>> y = Symbol('y', positive=True) + >>> n = Symbol('n', nonnegative=True) + >>> expr.subs({x: y, a: -10, n: n}) + (y + 10)**n + + The methods ``rewrite(DiracDelta)``, ``rewrite(Heaviside)``, and + ``rewrite('HeavisideDiracDelta')`` returns the same output. One can use any + of these methods according to their choice. + + >>> expr = SingularityFunction(x, 4, 5) + SingularityFunction(x, -3, -1) - SingularityFunction(x, 0, -2) + >>> expr.rewrite(Heaviside) + (x - 4)**5*Heaviside(x - 4, 1) + DiracDelta(x + 3) - DiracDelta(x, 1) + >>> expr.rewrite(DiracDelta) + (x - 4)**5*Heaviside(x - 4, 1) + DiracDelta(x + 3) - DiracDelta(x, 1) + >>> expr.rewrite('HeavisideDiracDelta') + (x - 4)**5*Heaviside(x - 4, 1) + DiracDelta(x + 3) - DiracDelta(x, 1) + + See Also + ======== + + DiracDelta, Heaviside + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Singularity_function + + """ + + is_real = True + + def fdiff(self, argindex=1): + """ + Returns the first derivative of a DiracDelta Function. + + Explanation + =========== + + The difference between ``diff()`` and ``fdiff()`` is: ``diff()`` is the + user-level function and ``fdiff()`` is an object method. ``fdiff()`` is + a convenience method available in the ``Function`` class. It returns + the derivative of the function without considering the chain rule. + ``diff(function, x)`` calls ``Function._eval_derivative`` which in turn + calls ``fdiff()`` internally to compute the derivative of the function. + + """ + + if argindex == 1: + x, a, n = self.args + if n in (S.Zero, S.NegativeOne, S(-2), S(-3)): + return self.func(x, a, n-1) + elif n.is_positive: + return n*self.func(x, a, n-1) + else: + raise ArgumentIndexError(self, argindex) + + @classmethod + def eval(cls, variable, offset, exponent): + """ + Returns a simplified form or a value of Singularity Function depending + on the argument passed by the object. + + Explanation + =========== + + The ``eval()`` method is automatically called when the + ``SingularityFunction`` class is about to be instantiated and it + returns either some simplified instance or the unevaluated instance + depending on the argument passed. In other words, ``eval()`` method is + not needed to be called explicitly, it is being called and evaluated + once the object is called. + + Examples + ======== + + >>> from sympy import SingularityFunction, Symbol, nan + >>> from sympy.abc import x, a, n + >>> SingularityFunction(x, a, n) + SingularityFunction(x, a, n) + >>> SingularityFunction(5, 3, 2) + 4 + >>> SingularityFunction(x, a, nan) + nan + >>> SingularityFunction(x, 3, 0).subs(x, 3) + 1 + >>> SingularityFunction(4, 1, 5) + 243 + >>> x = Symbol('x', positive = True) + >>> a = Symbol('a', negative = True) + >>> n = Symbol('n', nonnegative = True) + >>> SingularityFunction(x, a, n) + (-a + x)**n + >>> x = Symbol('x', negative = True) + >>> a = Symbol('a', positive = True) + >>> SingularityFunction(x, a, n) + 0 + + """ + + x = variable + a = offset + n = exponent + shift = (x - a) + + if fuzzy_not(im(shift).is_zero): + raise ValueError("Singularity Functions are defined only for Real Numbers.") + if fuzzy_not(im(n).is_zero): + raise ValueError("Singularity Functions are not defined for imaginary exponents.") + if shift is S.NaN or n is S.NaN: + return S.NaN + if (n + 4).is_negative: + raise ValueError("Singularity Functions are not defined for exponents less than -4.") + if shift.is_extended_negative: + return S.Zero + if n.is_nonnegative: + if shift.is_zero: # use literal 0 in case of Symbol('z', zero=True) + return S.Zero**n + if shift.is_extended_nonnegative: + return shift**n + if n in (S.NegativeOne, -2, -3, -4): + if shift.is_negative or shift.is_extended_positive: + return S.Zero + if shift.is_zero: + return oo + + def _eval_rewrite_as_Piecewise(self, *args, **kwargs): + ''' + Converts a Singularity Function expression into its Piecewise form. + + ''' + x, a, n = self.args + + if n in (S.NegativeOne, S(-2), S(-3), S(-4)): + return Piecewise((oo, Eq(x - a, 0)), (0, True)) + elif n.is_nonnegative: + return Piecewise(((x - a)**n, x - a >= 0), (0, True)) + + def _eval_rewrite_as_Heaviside(self, *args, **kwargs): + ''' + Rewrites a Singularity Function expression using Heavisides and DiracDeltas. + + ''' + x, a, n = self.args + + if n == -4: + return diff(Heaviside(x - a), x.free_symbols.pop(), 4) + if n == -3: + return diff(Heaviside(x - a), x.free_symbols.pop(), 3) + if n == -2: + return diff(Heaviside(x - a), x.free_symbols.pop(), 2) + if n == -1: + return diff(Heaviside(x - a), x.free_symbols.pop(), 1) + if n.is_nonnegative: + return (x - a)**n*Heaviside(x - a, 1) + + def _eval_as_leading_term(self, x, logx, cdir): + z, a, n = self.args + shift = (z - a).subs(x, 0) + if n < 0: + return S.Zero + elif n.is_zero and shift.is_zero: + return S.Zero if cdir == -1 else S.One + elif shift.is_positive: + return shift**n + return S.Zero + + def _eval_nseries(self, x, n, logx=None, cdir=0): + z, a, n = self.args + shift = (z - a).subs(x, 0) + if n < 0: + return S.Zero + elif n.is_zero and shift.is_zero: + return S.Zero if cdir == -1 else S.One + elif shift.is_positive: + return ((z - a)**n)._eval_nseries(x, n, logx=logx, cdir=cdir) + return S.Zero + + _eval_rewrite_as_DiracDelta = _eval_rewrite_as_Heaviside + _eval_rewrite_as_HeavisideDiracDelta = _eval_rewrite_as_Heaviside diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/spherical_harmonics.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/spherical_harmonics.py new file mode 100644 index 0000000000000000000000000000000000000000..541546b75e882b43c41814b5e92bb85ee41628d1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/spherical_harmonics.py @@ -0,0 +1,334 @@ +from sympy.core.expr import Expr +from sympy.core.function import DefinedFunction, ArgumentIndexError +from sympy.core.numbers import I, pi +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.functions import assoc_legendre +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import Abs, conjugate +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin, cos, cot + +_x = Dummy("x") + +class Ynm(DefinedFunction): + r""" + Spherical harmonics defined as + + .. math:: + Y_n^m(\theta, \varphi) := \sqrt{\frac{(2n+1)(n-m)!}{4\pi(n+m)!}} + \exp(i m \varphi) + \mathrm{P}_n^m\left(\cos(\theta)\right) + + Explanation + =========== + + ``Ynm()`` gives the spherical harmonic function of order $n$ and $m$ + in $\theta$ and $\varphi$, $Y_n^m(\theta, \varphi)$. The four + parameters are as follows: $n \geq 0$ an integer and $m$ an integer + such that $-n \leq m \leq n$ holds. The two angles are real-valued + with $\theta \in [0, \pi]$ and $\varphi \in [0, 2\pi]$. + + Examples + ======== + + >>> from sympy import Ynm, Symbol, simplify + >>> from sympy.abc import n,m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + + >>> Ynm(n, m, theta, phi) + Ynm(n, m, theta, phi) + + Several symmetries are known, for the order: + + >>> Ynm(n, -m, theta, phi) + (-1)**m*exp(-2*I*m*phi)*Ynm(n, m, theta, phi) + + As well as for the angles: + + >>> Ynm(n, m, -theta, phi) + Ynm(n, m, theta, phi) + + >>> Ynm(n, m, theta, -phi) + exp(-2*I*m*phi)*Ynm(n, m, theta, phi) + + For specific integers $n$ and $m$ we can evaluate the harmonics + to more useful expressions: + + >>> simplify(Ynm(0, 0, theta, phi).expand(func=True)) + 1/(2*sqrt(pi)) + + >>> simplify(Ynm(1, -1, theta, phi).expand(func=True)) + sqrt(6)*exp(-I*phi)*sin(theta)/(4*sqrt(pi)) + + >>> simplify(Ynm(1, 0, theta, phi).expand(func=True)) + sqrt(3)*cos(theta)/(2*sqrt(pi)) + + >>> simplify(Ynm(1, 1, theta, phi).expand(func=True)) + -sqrt(6)*exp(I*phi)*sin(theta)/(4*sqrt(pi)) + + >>> simplify(Ynm(2, -2, theta, phi).expand(func=True)) + sqrt(30)*exp(-2*I*phi)*sin(theta)**2/(8*sqrt(pi)) + + >>> simplify(Ynm(2, -1, theta, phi).expand(func=True)) + sqrt(30)*exp(-I*phi)*sin(2*theta)/(8*sqrt(pi)) + + >>> simplify(Ynm(2, 0, theta, phi).expand(func=True)) + sqrt(5)*(3*cos(theta)**2 - 1)/(4*sqrt(pi)) + + >>> simplify(Ynm(2, 1, theta, phi).expand(func=True)) + -sqrt(30)*exp(I*phi)*sin(2*theta)/(8*sqrt(pi)) + + >>> simplify(Ynm(2, 2, theta, phi).expand(func=True)) + sqrt(30)*exp(2*I*phi)*sin(theta)**2/(8*sqrt(pi)) + + We can differentiate the functions with respect + to both angles: + + >>> from sympy import Ynm, Symbol, diff + >>> from sympy.abc import n,m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + + >>> diff(Ynm(n, m, theta, phi), theta) + m*cot(theta)*Ynm(n, m, theta, phi) + sqrt((-m + n)*(m + n + 1))*exp(-I*phi)*Ynm(n, m + 1, theta, phi) + + >>> diff(Ynm(n, m, theta, phi), phi) + I*m*Ynm(n, m, theta, phi) + + Further we can compute the complex conjugation: + + >>> from sympy import Ynm, Symbol, conjugate + >>> from sympy.abc import n,m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + + >>> conjugate(Ynm(n, m, theta, phi)) + (-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi) + + To get back the well known expressions in spherical + coordinates, we use full expansion: + + >>> from sympy import Ynm, Symbol, expand_func + >>> from sympy.abc import n,m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + + >>> expand_func(Ynm(n, m, theta, phi)) + sqrt((2*n + 1)*factorial(-m + n)/factorial(m + n))*exp(I*m*phi)*assoc_legendre(n, m, cos(theta))/(2*sqrt(pi)) + + See Also + ======== + + Ynm_c, Znm + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Spherical_harmonics + .. [2] https://mathworld.wolfram.com/SphericalHarmonic.html + .. [3] https://functions.wolfram.com/Polynomials/SphericalHarmonicY/ + .. [4] https://dlmf.nist.gov/14.30 + + """ + + @classmethod + def eval(cls, n, m, theta, phi): + # Handle negative index m and arguments theta, phi + if m.could_extract_minus_sign(): + m = -m + return S.NegativeOne**m * exp(-2*I*m*phi) * Ynm(n, m, theta, phi) + if theta.could_extract_minus_sign(): + theta = -theta + return Ynm(n, m, theta, phi) + if phi.could_extract_minus_sign(): + phi = -phi + return exp(-2*I*m*phi) * Ynm(n, m, theta, phi) + + # TODO Add more simplififcation here + + def _eval_expand_func(self, **hints): + n, m, theta, phi = self.args + rv = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) * + exp(I*m*phi) * assoc_legendre(n, m, cos(theta))) + # We can do this because of the range of theta + return rv.subs(sqrt(-cos(theta)**2 + 1), sin(theta)) + + def fdiff(self, argindex=4): + if argindex == 1: + # Diff wrt n + raise ArgumentIndexError(self, argindex) + elif argindex == 2: + # Diff wrt m + raise ArgumentIndexError(self, argindex) + elif argindex == 3: + # Diff wrt theta + n, m, theta, phi = self.args + return (m * cot(theta) * Ynm(n, m, theta, phi) + + sqrt((n - m)*(n + m + 1)) * exp(-I*phi) * Ynm(n, m + 1, theta, phi)) + elif argindex == 4: + # Diff wrt phi + n, m, theta, phi = self.args + return I * m * Ynm(n, m, theta, phi) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_polynomial(self, n, m, theta, phi, **kwargs): + # TODO: Make sure n \in N + # TODO: Assert |m| <= n ortherwise we should return 0 + return self.expand(func=True) + + def _eval_rewrite_as_sin(self, n, m, theta, phi, **kwargs): + return self.rewrite(cos) + + def _eval_rewrite_as_cos(self, n, m, theta, phi, **kwargs): + # This method can be expensive due to extensive use of simplification! + from sympy.simplify import simplify, trigsimp + # TODO: Make sure n \in N + # TODO: Assert |m| <= n ortherwise we should return 0 + term = simplify(self.expand(func=True)) + # We can do this because of the range of theta + term = term.xreplace({Abs(sin(theta)):sin(theta)}) + return simplify(trigsimp(term)) + + def _eval_conjugate(self): + # TODO: Make sure theta \in R and phi \in R + n, m, theta, phi = self.args + return S.NegativeOne**m * self.func(n, -m, theta, phi) + + def as_real_imag(self, deep=True, **hints): + # TODO: Handle deep and hints + n, m, theta, phi = self.args + re = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) * + cos(m*phi) * assoc_legendre(n, m, cos(theta))) + im = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) * + sin(m*phi) * assoc_legendre(n, m, cos(theta))) + return (re, im) + + def _eval_evalf(self, prec): + # Note: works without this function by just calling + # mpmath for Legendre polynomials. But using + # the dedicated function directly is cleaner. + from mpmath import mp, workprec + n = self.args[0]._to_mpmath(prec) + m = self.args[1]._to_mpmath(prec) + theta = self.args[2]._to_mpmath(prec) + phi = self.args[3]._to_mpmath(prec) + with workprec(prec): + res = mp.spherharm(n, m, theta, phi) + return Expr._from_mpmath(res, prec) + + +def Ynm_c(n, m, theta, phi): + r""" + Conjugate spherical harmonics defined as + + .. math:: + \overline{Y_n^m(\theta, \varphi)} := (-1)^m Y_n^{-m}(\theta, \varphi). + + Examples + ======== + + >>> from sympy import Ynm_c, Symbol, simplify + >>> from sympy.abc import n,m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + >>> Ynm_c(n, m, theta, phi) + (-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi) + >>> Ynm_c(n, m, -theta, phi) + (-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi) + + For specific integers $n$ and $m$ we can evaluate the harmonics + to more useful expressions: + + >>> simplify(Ynm_c(0, 0, theta, phi).expand(func=True)) + 1/(2*sqrt(pi)) + >>> simplify(Ynm_c(1, -1, theta, phi).expand(func=True)) + sqrt(6)*exp(I*(-phi + 2*conjugate(phi)))*sin(theta)/(4*sqrt(pi)) + + See Also + ======== + + Ynm, Znm + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Spherical_harmonics + .. [2] https://mathworld.wolfram.com/SphericalHarmonic.html + .. [3] https://functions.wolfram.com/Polynomials/SphericalHarmonicY/ + + """ + return conjugate(Ynm(n, m, theta, phi)) + + +class Znm(DefinedFunction): + r""" + Real spherical harmonics defined as + + .. math:: + + Z_n^m(\theta, \varphi) := + \begin{cases} + \frac{Y_n^m(\theta, \varphi) + \overline{Y_n^m(\theta, \varphi)}}{\sqrt{2}} &\quad m > 0 \\ + Y_n^m(\theta, \varphi) &\quad m = 0 \\ + \frac{Y_n^m(\theta, \varphi) - \overline{Y_n^m(\theta, \varphi)}}{i \sqrt{2}} &\quad m < 0 \\ + \end{cases} + + which gives in simplified form + + .. math:: + + Z_n^m(\theta, \varphi) = + \begin{cases} + \frac{Y_n^m(\theta, \varphi) + (-1)^m Y_n^{-m}(\theta, \varphi)}{\sqrt{2}} &\quad m > 0 \\ + Y_n^m(\theta, \varphi) &\quad m = 0 \\ + \frac{Y_n^m(\theta, \varphi) - (-1)^m Y_n^{-m}(\theta, \varphi)}{i \sqrt{2}} &\quad m < 0 \\ + \end{cases} + + Examples + ======== + + >>> from sympy import Znm, Symbol, simplify + >>> from sympy.abc import n, m + >>> theta = Symbol("theta") + >>> phi = Symbol("phi") + >>> Znm(n, m, theta, phi) + Znm(n, m, theta, phi) + + For specific integers n and m we can evaluate the harmonics + to more useful expressions: + + >>> simplify(Znm(0, 0, theta, phi).expand(func=True)) + 1/(2*sqrt(pi)) + >>> simplify(Znm(1, 1, theta, phi).expand(func=True)) + -sqrt(3)*sin(theta)*cos(phi)/(2*sqrt(pi)) + >>> simplify(Znm(2, 1, theta, phi).expand(func=True)) + -sqrt(15)*sin(2*theta)*cos(phi)/(4*sqrt(pi)) + + See Also + ======== + + Ynm, Ynm_c + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Spherical_harmonics + .. [2] https://mathworld.wolfram.com/SphericalHarmonic.html + .. [3] https://functions.wolfram.com/Polynomials/SphericalHarmonicY/ + + """ + + @classmethod + def eval(cls, n, m, theta, phi): + if m.is_positive: + zz = (Ynm(n, m, theta, phi) + Ynm_c(n, m, theta, phi)) / sqrt(2) + return zz + elif m.is_zero: + return Ynm(n, m, theta, phi) + elif m.is_negative: + zz = (Ynm(n, m, theta, phi) - Ynm_c(n, m, theta, phi)) / (sqrt(2)*I) + return zz diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tensor_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tensor_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..6d996a58cbc8320620c9a1f6e68529c3b5e99aef --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tensor_functions.py @@ -0,0 +1,474 @@ +from math import prod + +from sympy.core import S, Integer +from sympy.core.function import DefinedFunction +from sympy.core.logic import fuzzy_not +from sympy.core.relational import Ne +from sympy.core.sorting import default_sort_key +from sympy.external.gmpy import SYMPY_INTS +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.piecewise import Piecewise +from sympy.utilities.iterables import has_dups + +############################################################################### +###################### Kronecker Delta, Levi-Civita etc. ###################### +############################################################################### + + +def Eijk(*args, **kwargs): + """ + Represent the Levi-Civita symbol. + + This is a compatibility wrapper to ``LeviCivita()``. + + See Also + ======== + + LeviCivita + + """ + return LeviCivita(*args, **kwargs) + + +def eval_levicivita(*args): + """Evaluate Levi-Civita symbol.""" + n = len(args) + return prod( + prod(args[j] - args[i] for j in range(i + 1, n)) + / factorial(i) for i in range(n)) + # converting factorial(i) to int is slightly faster + + +class LeviCivita(DefinedFunction): + """ + Represent the Levi-Civita symbol. + + Explanation + =========== + + For even permutations of indices it returns 1, for odd permutations -1, and + for everything else (a repeated index) it returns 0. + + Thus it represents an alternating pseudotensor. + + Examples + ======== + + >>> from sympy import LeviCivita + >>> from sympy.abc import i, j, k + >>> LeviCivita(1, 2, 3) + 1 + >>> LeviCivita(1, 3, 2) + -1 + >>> LeviCivita(1, 2, 2) + 0 + >>> LeviCivita(i, j, k) + LeviCivita(i, j, k) + >>> LeviCivita(i, j, i) + 0 + + See Also + ======== + + Eijk + + """ + + is_integer = True + + @classmethod + def eval(cls, *args): + if all(isinstance(a, (SYMPY_INTS, Integer)) for a in args): + return eval_levicivita(*args) + if has_dups(args): + return S.Zero + + def doit(self, **hints): + return eval_levicivita(*self.args) + + +class KroneckerDelta(DefinedFunction): + """ + The discrete, or Kronecker, delta function. + + Explanation + =========== + + A function that takes in two integers $i$ and $j$. It returns $0$ if $i$ + and $j$ are not equal, or it returns $1$ if $i$ and $j$ are equal. + + Examples + ======== + + An example with integer indices: + + >>> from sympy import KroneckerDelta + >>> KroneckerDelta(1, 2) + 0 + >>> KroneckerDelta(3, 3) + 1 + + Symbolic indices: + + >>> from sympy.abc import i, j, k + >>> KroneckerDelta(i, j) + KroneckerDelta(i, j) + >>> KroneckerDelta(i, i) + 1 + >>> KroneckerDelta(i, i + 1) + 0 + >>> KroneckerDelta(i, i + 1 + k) + KroneckerDelta(i, i + k + 1) + + Parameters + ========== + + i : Number, Symbol + The first index of the delta function. + j : Number, Symbol + The second index of the delta function. + + See Also + ======== + + eval + DiracDelta + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Kronecker_delta + + """ + + is_integer = True + + @classmethod + def eval(cls, i, j, delta_range=None): + """ + Evaluates the discrete delta function. + + Examples + ======== + + >>> from sympy import KroneckerDelta + >>> from sympy.abc import i, j, k + + >>> KroneckerDelta(i, j) + KroneckerDelta(i, j) + >>> KroneckerDelta(i, i) + 1 + >>> KroneckerDelta(i, i + 1) + 0 + >>> KroneckerDelta(i, i + 1 + k) + KroneckerDelta(i, i + k + 1) + + # indirect doctest + + """ + + if delta_range is not None: + dinf, dsup = delta_range + if (dinf - i > 0) == True: + return S.Zero + if (dinf - j > 0) == True: + return S.Zero + if (dsup - i < 0) == True: + return S.Zero + if (dsup - j < 0) == True: + return S.Zero + + diff = i - j + if diff.is_zero: + return S.One + elif fuzzy_not(diff.is_zero): + return S.Zero + + if i.assumptions0.get("below_fermi") and \ + j.assumptions0.get("above_fermi"): + return S.Zero + if j.assumptions0.get("below_fermi") and \ + i.assumptions0.get("above_fermi"): + return S.Zero + # to make KroneckerDelta canonical + # following lines will check if inputs are in order + # if not, will return KroneckerDelta with correct order + if default_sort_key(j) < default_sort_key(i): + if delta_range: + return cls(j, i, delta_range) + else: + return cls(j, i) + + @property + def delta_range(self): + if len(self.args) > 2: + return self.args[2] + + def _eval_power(self, expt): + if expt.is_positive: + return self + if expt.is_negative and expt is not S.NegativeOne: + return 1/self + + @property + def is_above_fermi(self): + """ + True if Delta can be non-zero above fermi. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> p = Symbol('p') + >>> q = Symbol('q') + >>> KroneckerDelta(p, a).is_above_fermi + True + >>> KroneckerDelta(p, i).is_above_fermi + False + >>> KroneckerDelta(p, q).is_above_fermi + True + + See Also + ======== + + is_below_fermi, is_only_below_fermi, is_only_above_fermi + + """ + if self.args[0].assumptions0.get("below_fermi"): + return False + if self.args[1].assumptions0.get("below_fermi"): + return False + return True + + @property + def is_below_fermi(self): + """ + True if Delta can be non-zero below fermi. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> p = Symbol('p') + >>> q = Symbol('q') + >>> KroneckerDelta(p, a).is_below_fermi + False + >>> KroneckerDelta(p, i).is_below_fermi + True + >>> KroneckerDelta(p, q).is_below_fermi + True + + See Also + ======== + + is_above_fermi, is_only_above_fermi, is_only_below_fermi + + """ + if self.args[0].assumptions0.get("above_fermi"): + return False + if self.args[1].assumptions0.get("above_fermi"): + return False + return True + + @property + def is_only_above_fermi(self): + """ + True if Delta is restricted to above fermi. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> p = Symbol('p') + >>> q = Symbol('q') + >>> KroneckerDelta(p, a).is_only_above_fermi + True + >>> KroneckerDelta(p, q).is_only_above_fermi + False + >>> KroneckerDelta(p, i).is_only_above_fermi + False + + See Also + ======== + + is_above_fermi, is_below_fermi, is_only_below_fermi + + """ + return ( self.args[0].assumptions0.get("above_fermi") + or + self.args[1].assumptions0.get("above_fermi") + ) or False + + @property + def is_only_below_fermi(self): + """ + True if Delta is restricted to below fermi. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> p = Symbol('p') + >>> q = Symbol('q') + >>> KroneckerDelta(p, i).is_only_below_fermi + True + >>> KroneckerDelta(p, q).is_only_below_fermi + False + >>> KroneckerDelta(p, a).is_only_below_fermi + False + + See Also + ======== + + is_above_fermi, is_below_fermi, is_only_above_fermi + + """ + return ( self.args[0].assumptions0.get("below_fermi") + or + self.args[1].assumptions0.get("below_fermi") + ) or False + + @property + def indices_contain_equal_information(self): + """ + Returns True if indices are either both above or below fermi. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> p = Symbol('p') + >>> q = Symbol('q') + >>> KroneckerDelta(p, q).indices_contain_equal_information + True + >>> KroneckerDelta(p, q+1).indices_contain_equal_information + True + >>> KroneckerDelta(i, p).indices_contain_equal_information + False + + """ + if (self.args[0].assumptions0.get("below_fermi") and + self.args[1].assumptions0.get("below_fermi")): + return True + if (self.args[0].assumptions0.get("above_fermi") + and self.args[1].assumptions0.get("above_fermi")): + return True + + # if both indices are general we are True, else false + return self.is_below_fermi and self.is_above_fermi + + @property + def preferred_index(self): + """ + Returns the index which is preferred to keep in the final expression. + + Explanation + =========== + + The preferred index is the index with more information regarding fermi + level. If indices contain the same information, 'a' is preferred before + 'b'. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> j = Symbol('j', below_fermi=True) + >>> p = Symbol('p') + >>> KroneckerDelta(p, i).preferred_index + i + >>> KroneckerDelta(p, a).preferred_index + a + >>> KroneckerDelta(i, j).preferred_index + i + + See Also + ======== + + killable_index + + """ + if self._get_preferred_index(): + return self.args[1] + else: + return self.args[0] + + @property + def killable_index(self): + """ + Returns the index which is preferred to substitute in the final + expression. + + Explanation + =========== + + The index to substitute is the index with less information regarding + fermi level. If indices contain the same information, 'a' is preferred + before 'b'. + + Examples + ======== + + >>> from sympy import KroneckerDelta, Symbol + >>> a = Symbol('a', above_fermi=True) + >>> i = Symbol('i', below_fermi=True) + >>> j = Symbol('j', below_fermi=True) + >>> p = Symbol('p') + >>> KroneckerDelta(p, i).killable_index + p + >>> KroneckerDelta(p, a).killable_index + p + >>> KroneckerDelta(i, j).killable_index + j + + See Also + ======== + + preferred_index + + """ + if self._get_preferred_index(): + return self.args[0] + else: + return self.args[1] + + def _get_preferred_index(self): + """ + Returns the index which is preferred to keep in the final expression. + + The preferred index is the index with more information regarding fermi + level. If indices contain the same information, index 0 is returned. + + """ + if not self.is_above_fermi: + if self.args[0].assumptions0.get("below_fermi"): + return 0 + else: + return 1 + elif not self.is_below_fermi: + if self.args[0].assumptions0.get("above_fermi"): + return 0 + else: + return 1 + else: + return 0 + + @property + def indices(self): + return self.args[0:2] + + def _eval_rewrite_as_Piecewise(self, *args, **kwargs): + i, j = args + return Piecewise((0, Ne(i, j)), (1, True)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bessel.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bessel.py new file mode 100644 index 0000000000000000000000000000000000000000..ccd1ce88ca9dea15f065e7c57d488498b8f79f4e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bessel.py @@ -0,0 +1,807 @@ +from itertools import product + +from sympy.concrete.summations import Sum +from sympy.core.function import (diff, expand_func) +from sympy.core.numbers import (I, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (conjugate, polar_lift) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import (cosh, sinh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.bessel import (besseli, besselj, besselk, bessely, hankel1, hankel2, hn1, hn2, jn, jn_zeros, yn) +from sympy.functions.special.gamma_functions import (gamma, uppergamma) +from sympy.functions.special.hyper import hyper +from sympy.integrals.integrals import Integral +from sympy.series.order import O +from sympy.series.series import series +from sympy.functions.special.bessel import (airyai, airybi, + airyaiprime, airybiprime, marcumq) +from sympy.core.random import (random_complex_number as randcplx, + verify_numerically as tn, + test_derivative_numerically as td, + _randint) +from sympy.simplify import besselsimp +from sympy.testing.pytest import raises, slow + +from sympy.abc import z, n, k, x + +randint = _randint() + + +def test_bessel_rand(): + for f in [besselj, bessely, besseli, besselk, hankel1, hankel2]: + assert td(f(randcplx(), z), z) + + for f in [jn, yn, hn1, hn2]: + assert td(f(randint(-10, 10), z), z) + + +def test_bessel_twoinputs(): + for f in [besselj, bessely, besseli, besselk, hankel1, hankel2, jn, yn]: + raises(TypeError, lambda: f(1)) + raises(TypeError, lambda: f(1, 2, 3)) + + +def test_besselj_leading_term(): + assert besselj(0, x).as_leading_term(x) == 1 + assert besselj(1, sin(x)).as_leading_term(x) == x/2 + assert besselj(1, 2*sqrt(x)).as_leading_term(x) == sqrt(x) + + # https://github.com/sympy/sympy/issues/21701 + assert (besselj(z, x)/x**z).as_leading_term(x) == 1/(2**z*gamma(z + 1)) + + +def test_bessely_leading_term(): + assert bessely(0, x).as_leading_term(x) == (2*log(x) - 2*log(2) + 2*S.EulerGamma)/pi + assert bessely(1, sin(x)).as_leading_term(x) == -2/(pi*x) + assert bessely(1, 2*sqrt(x)).as_leading_term(x) == -1/(pi*sqrt(x)) + + +def test_besseli_leading_term(): + assert besseli(0, x).as_leading_term(x) == 1 + assert besseli(1, sin(x)).as_leading_term(x) == x/2 + assert besseli(1, 2*sqrt(x)).as_leading_term(x) == sqrt(x) + + +def test_besselk_leading_term(): + assert besselk(0, x).as_leading_term(x) == -log(x) - S.EulerGamma + log(2) + assert besselk(1, sin(x)).as_leading_term(x) == 1/x + assert besselk(1, 2*sqrt(x)).as_leading_term(x) == 1/(2*sqrt(x)) + assert besselk(S(5)/3, x).as_leading_term(x) == 2**(S(2)/3)*gamma(S(5)/3)/x**(S(5)/3) + assert besselk(S(2)/3, x).as_leading_term(x) == besselk(-S(2)/3, x).as_leading_term(x) + assert besselk(1,cos(x)).as_leading_term(x) == besselk(1,1) + assert besselk(3,1/x).as_leading_term(x) == sqrt(pi)*exp(-(1/x))/sqrt(2/x) + assert besselk(3,1/sin(x)).as_leading_term(x) == sqrt(pi)*exp(-(1/x))/sqrt(2/x) + + nz = Symbol("nz", nonzero=True) + assert besselk(nz, x).as_leading_term(x).subs({nz:S(5)/7}) == besselk(S(5)/7, x).series(x).as_leading_term(x) + assert besselk(nz, x).as_leading_term(x).subs({nz:S(-15)/7}) == besselk(S(-15)/7, x).series(x).as_leading_term(x) + assert besselk(nz, x).as_leading_term(x).subs({nz:3}) == besselk(3, x).series(x).as_leading_term(x) + assert besselk(nz, x).as_leading_term(x).subs({nz:-2}) == besselk(-2, x).series(x).as_leading_term(x) + + +def test_besselj_series(): + assert besselj(0, x).series(x) == 1 - x**2/4 + x**4/64 + O(x**6) + assert besselj(0, x**(1.1)).series(x) == 1 + x**4.4/64 - x**2.2/4 + O(x**6) + assert besselj(0, x**2 + x).series(x) == 1 - x**2/4 - x**3/2\ + - 15*x**4/64 + x**5/16 + O(x**6) + assert besselj(0, sqrt(x) + x).series(x, n=4) == 1 - x/4 - 15*x**2/64\ + + 215*x**3/2304 - x**Rational(3, 2)/2 + x**Rational(5, 2)/16\ + + 23*x**Rational(7, 2)/384 + O(x**4) + assert besselj(0, x/(1 - x)).series(x) == 1 - x**2/4 - x**3/2 - 47*x**4/64\ + - 15*x**5/16 + O(x**6) + assert besselj(0, log(1 + x)).series(x) == 1 - x**2/4 + x**3/4\ + - 41*x**4/192 + 17*x**5/96 + O(x**6) + assert besselj(1, sin(x)).series(x) == x/2 - 7*x**3/48 + 73*x**5/1920 + O(x**6) + assert besselj(1, 2*sqrt(x)).series(x) == sqrt(x) - x**Rational(3, 2)/2\ + + x**Rational(5, 2)/12 - x**Rational(7, 2)/144 + x**Rational(9, 2)/2880\ + - x**Rational(11, 2)/86400 + O(x**6) + assert besselj(-2, sin(x)).series(x, n=4) == besselj(2, sin(x)).series(x, n=4) + + +def test_bessely_series(): + const = 2*S.EulerGamma/pi - 2*log(2)/pi + 2*log(x)/pi + assert bessely(0, x).series(x, n=4) == const + x**2*(-log(x)/(2*pi)\ + + (2 - 2*S.EulerGamma)/(4*pi) + log(2)/(2*pi)) + O(x**4*log(x)) + assert bessely(1, x).series(x, n=4) == -2/(pi*x) + x*(log(x)/pi - log(2)/pi - \ + (1 - 2*S.EulerGamma)/(2*pi)) + x**3*(-log(x)/(8*pi) + \ + (S(5)/2 - 2*S.EulerGamma)/(16*pi) + log(2)/(8*pi)) + O(x**4*log(x)) + assert bessely(2, x).series(x, n=4) == -4/(pi*x**2) - 1/pi + x**2*(log(x)/(4*pi) - \ + log(2)/(4*pi) - (S(3)/2 - 2*S.EulerGamma)/(8*pi)) + O(x**4*log(x)) + assert bessely(3, x).series(x, n=4) == -16/(pi*x**3) - 2/(pi*x) - \ + x/(4*pi) + x**3*(log(x)/(24*pi) - log(2)/(24*pi) - \ + (S(11)/6 - 2*S.EulerGamma)/(48*pi)) + O(x**4*log(x)) + assert bessely(0, x**(1.1)).series(x, n=4) == 2*S.EulerGamma/pi\ + - 2*log(2)/pi + 2.2*log(x)/pi + x**2.2*(-0.55*log(x)/pi\ + + (2 - 2*S.EulerGamma)/(4*pi) + log(2)/(2*pi)) + O(x**4*log(x)) + assert bessely(0, x**2 + x).series(x, n=4) == \ + const - (2 - 2*S.EulerGamma)*(-x**3/(2*pi) - x**2/(4*pi)) + 2*x/pi\ + + x**2*(-log(x)/(2*pi) - 1/pi + log(2)/(2*pi))\ + + x**3*(-log(x)/pi + 1/(6*pi) + log(2)/pi) + O(x**4*log(x)) + assert bessely(0, x/(1 - x)).series(x, n=3) == const\ + + 2*x/pi + x**2*(-log(x)/(2*pi) + (2 - 2*S.EulerGamma)/(4*pi)\ + + log(2)/(2*pi) + 1/pi) + O(x**3*log(x)) + assert bessely(0, log(1 + x)).series(x, n=3) == const\ + - x/pi + x**2*(-log(x)/(2*pi) + (2 - 2*S.EulerGamma)/(4*pi)\ + + log(2)/(2*pi) + 5/(12*pi)) + O(x**3*log(x)) + assert bessely(1, sin(x)).series(x, n=4) == -1/(pi*(-x**3/12 + x/2)) - \ + (1 - 2*S.EulerGamma)*(-x**3/12 + x/2)/pi + x*(log(x)/pi - log(2)/pi) + \ + x**3*(-7*log(x)/(24*pi) - 1/(6*pi) + (S(5)/2 - 2*S.EulerGamma)/(16*pi) + + 7*log(2)/(24*pi)) + O(x**4*log(x)) + assert bessely(1, 2*sqrt(x)).series(x, n=3) == -1/(pi*sqrt(x)) + \ + sqrt(x)*(log(x)/pi - (1 - 2*S.EulerGamma)/pi) + x**(S(3)/2)*(-log(x)/(2*pi) + \ + (S(5)/2 - 2*S.EulerGamma)/(2*pi)) + x**(S(5)/2)*(log(x)/(12*pi) - \ + (S(10)/3 - 2*S.EulerGamma)/(12*pi)) + O(x**3*log(x)) + assert bessely(-2, sin(x)).series(x, n=4) == bessely(2, sin(x)).series(x, n=4) + + +def test_besseli_series(): + assert besseli(0, x).series(x) == 1 + x**2/4 + x**4/64 + O(x**6) + assert besseli(0, x**(1.1)).series(x) == 1 + x**4.4/64 + x**2.2/4 + O(x**6) + assert besseli(0, x**2 + x).series(x) == 1 + x**2/4 + x**3/2 + 17*x**4/64 + \ + x**5/16 + O(x**6) + assert besseli(0, sqrt(x) + x).series(x, n=4) == 1 + x/4 + 17*x**2/64 + \ + 217*x**3/2304 + x**(S(3)/2)/2 + x**(S(5)/2)/16 + 25*x**(S(7)/2)/384 + O(x**4) + assert besseli(0, x/(1 - x)).series(x) == 1 + x**2/4 + x**3/2 + 49*x**4/64 + \ + 17*x**5/16 + O(x**6) + assert besseli(0, log(1 + x)).series(x) == 1 + x**2/4 - x**3/4 + 47*x**4/192 - \ + 23*x**5/96 + O(x**6) + assert besseli(1, sin(x)).series(x) == x/2 - x**3/48 - 47*x**5/1920 + O(x**6) + assert besseli(1, 2*sqrt(x)).series(x) == sqrt(x) + x**(S(3)/2)/2 + x**(S(5)/2)/12 + \ + x**(S(7)/2)/144 + x**(S(9)/2)/2880 + x**(S(11)/2)/86400 + O(x**6) + assert besseli(-2, sin(x)).series(x, n=4) == besseli(2, sin(x)).series(x, n=4) + + #test for aseries + assert besseli(0,x).series(x, oo, n=4) == sqrt(2)*(sqrt(1/x) - (1/x)**(S(3)/2)/8 - \ + 3*(1/x)**(S(5)/2)/128 - 15*(1/x)**(S(7)/2)/1024 + O((1/x)**(S(9)/2), (x, oo)))*exp(x)/(2*sqrt(pi)) + assert besseli(0,x).series(x,-oo, n=4) == sqrt(2)*(sqrt(-1/x) - (-1/x)**(S(3)/2)/8 - 3*(-1/x)**(S(5)/2)/128 - \ + 15*(-1/x)**(S(7)/2)/1024 + O((-1/x)**(S(9)/2), (x, -oo)))*exp(-x)/(2*sqrt(pi)) + + +def test_besselk_series(): + const = log(2) - S.EulerGamma - log(x) + assert besselk(0, x).series(x, n=4) == const + \ + x**2*(-log(x)/4 - S.EulerGamma/4 + log(2)/4 + S(1)/4) + O(x**4*log(x)) + assert besselk(1, x).series(x, n=4) == 1/x + x*(log(x)/2 - log(2)/2 - \ + S(1)/4 + S.EulerGamma/2) + x**3*(log(x)/16 - S(5)/64 - log(2)/16 + \ + S.EulerGamma/16) + O(x**4*log(x)) + assert besselk(2, x).series(x, n=4) == 2/x**2 - S(1)/2 + x**2*(-log(x)/8 - \ + S.EulerGamma/8 + log(2)/8 + S(3)/32) + O(x**4*log(x)) + assert besselk(2, x).series(x, n=1) == 2/x**2 - S(1)/2 + O(x) #edge case for series truncation + assert besselk(0, x**(1.1)).series(x, n=4) == log(2) - S.EulerGamma - \ + 1.1*log(x) + x**2.2*(-0.275*log(x) - S.EulerGamma/4 + \ + log(2)/4 + S(1)/4) + O(x**4*log(x)) + assert besselk(0, x**2 + x).series(x, n=4) == const + \ + (2 - 2*S.EulerGamma)*(x**3/4 + x**2/8) - x + x**2*(-log(x)/4 + \ + log(2)/4 + S(1)/2) + x**3*(-log(x)/2 - S(7)/12 + log(2)/2) + O(x**4*log(x)) + assert besselk(0, x/(1 - x)).series(x, n=3) == const - x + x**2*(-log(x)/4 - \ + S(1)/4 - S.EulerGamma/4 + log(2)/4) + O(x**3*log(x)) + assert besselk(0, log(1 + x)).series(x, n=3) == const + x/2 + \ + x**2*(-log(x)/4 - S.EulerGamma/4 + S(1)/24 + log(2)/4) + O(x**3*log(x)) + assert besselk(1, 2*sqrt(x)).series(x, n=3) == 1/(2*sqrt(x)) + \ + sqrt(x)*(log(x)/2 - S(1)/2 + S.EulerGamma) + x**(S(3)/2)*(log(x)/4 - S(5)/8 + \ + S.EulerGamma/2) + x**(S(5)/2)*(log(x)/24 - S(5)/36 + S.EulerGamma/12) + O(x**3*log(x)) + assert besselk(-2, sin(x)).series(x, n=4) == besselk(2, sin(x)).series(x, n=4) + assert besselk(2, x**2).series(x, n=2) == 2/x**4 - S(1)/2 + O(x**2) #edge case for series truncation + assert besselk(2, x**2).series(x, n=6) == 2/x**4 - S(1)/2 + x**4*(-log(x)/4 - S.EulerGamma/8 + log(2)/8 + S(3)/32) + O(x**6*log(x)) + assert (x**2*besselk(2, x)).series(x, n=2) == 2 + O(x**2) + + #test for aseries + assert besselk(0,x).series(x, oo, n=4) == sqrt(2)*sqrt(pi)*(sqrt(1/x) + (1/x)**(S(3)/2)/8 - \ + 3*(1/x)**(S(5)/2)/128 + 15*(1/x)**(S(7)/2)/1024 + O((1/x)**(S(9)/2), (x, oo)))*exp(-x)/2 + assert besselk(0,x).series(x, -oo, n=4) == sqrt(2)*sqrt(pi)*(-I*sqrt(-1/x) + I*(-1/x)**(S(3)/2)/8 + \ + 3*I*(-1/x)**(S(5)/2)/128 + 15*I*(-1/x)**(S(7)/2)/1024 + O((-1/x)**(S(9)/2), (x, -oo)))*exp(-x)/2 + + +def test_besselk_frac_order_series(): + assert besselk(S(5)/3, x).series(x, n=2) == 2**(S(2)/3)*gamma(S(5)/3)/x**(S(5)/3) - \ + 3*gamma(S(5)/3)*x**(S(1)/3)/(4*2**(S(1)/3)) + \ + gamma(-S(5)/3)*x**(S(5)/3)/(4*2**(S(2)/3)) + O(x**2) + assert besselk(S(1)/2, x).series(x, n=2) == sqrt(pi/2)/sqrt(x) - \ + sqrt(pi*x/2) + x**(S(3)/2)*sqrt(pi/2)/2 + O(x**2) + assert besselk(S(1)/2, sqrt(x)).series(x, n=2) == sqrt(pi/2)/x**(S(1)/4) - \ + sqrt(pi/2)*x**(S(1)/4) + sqrt(pi/2)*x**(S(3)/4)/2 - \ + sqrt(pi/2)*x**(S(5)/4)/6 + sqrt(pi/2)*x**(S(7)/4)/24 + O(x**2) + assert besselk(S(1)/2, x**2).series(x, n=2) == sqrt(pi/2)/x \ + - sqrt(pi/2)*x + O(x**2) + assert besselk(-S(1)/2, x).series(x) == besselk(S(1)/2, x).series(x) + assert besselk(-S(7)/6, x).series(x) == besselk(S(7)/6, x).series(x) + + +def test_diff(): + assert besselj(n, z).diff(z) == besselj(n - 1, z)/2 - besselj(n + 1, z)/2 + assert bessely(n, z).diff(z) == bessely(n - 1, z)/2 - bessely(n + 1, z)/2 + assert besseli(n, z).diff(z) == besseli(n - 1, z)/2 + besseli(n + 1, z)/2 + assert besselk(n, z).diff(z) == -besselk(n - 1, z)/2 - besselk(n + 1, z)/2 + assert hankel1(n, z).diff(z) == hankel1(n - 1, z)/2 - hankel1(n + 1, z)/2 + assert hankel2(n, z).diff(z) == hankel2(n - 1, z)/2 - hankel2(n + 1, z)/2 + + +def test_rewrite(): + assert besselj(n, z).rewrite(jn) == sqrt(2*z/pi)*jn(n - S.Half, z) + assert bessely(n, z).rewrite(yn) == sqrt(2*z/pi)*yn(n - S.Half, z) + assert besseli(n, z).rewrite(besselj) == \ + exp(-I*n*pi/2)*besselj(n, polar_lift(I)*z) + assert besselj(n, z).rewrite(besseli) == \ + exp(I*n*pi/2)*besseli(n, polar_lift(-I)*z) + + nu = randcplx() + + assert tn(besselj(nu, z), besselj(nu, z).rewrite(besseli), z) + assert tn(besselj(nu, z), besselj(nu, z).rewrite(bessely), z) + + assert tn(besseli(nu, z), besseli(nu, z).rewrite(besselj), z) + assert tn(besseli(nu, z), besseli(nu, z).rewrite(bessely), z) + + assert tn(bessely(nu, z), bessely(nu, z).rewrite(besselj), z) + assert tn(bessely(nu, z), bessely(nu, z).rewrite(besseli), z) + + assert tn(besselk(nu, z), besselk(nu, z).rewrite(besselj), z) + assert tn(besselk(nu, z), besselk(nu, z).rewrite(besseli), z) + assert tn(besselk(nu, z), besselk(nu, z).rewrite(bessely), z) + + # check that a rewrite was triggered, when the order is set to a generic + # symbol 'nu' + assert yn(nu, z) != yn(nu, z).rewrite(jn) + assert hn1(nu, z) != hn1(nu, z).rewrite(jn) + assert hn2(nu, z) != hn2(nu, z).rewrite(jn) + assert jn(nu, z) != jn(nu, z).rewrite(yn) + assert hn1(nu, z) != hn1(nu, z).rewrite(yn) + assert hn2(nu, z) != hn2(nu, z).rewrite(yn) + + # rewriting spherical bessel functions (SBFs) w.r.t. besselj, bessely is + # not allowed if a generic symbol 'nu' is used as the order of the SBFs + # to avoid inconsistencies (the order of bessel[jy] is allowed to be + # complex-valued, whereas SBFs are defined only for integer orders) + order = nu + for f in (besselj, bessely): + assert hn1(order, z) == hn1(order, z).rewrite(f) + assert hn2(order, z) == hn2(order, z).rewrite(f) + + assert jn(order, z).rewrite(besselj) == sqrt(2)*sqrt(pi)*sqrt(1/z)*besselj(order + S.Half, z)/2 + assert jn(order, z).rewrite(bessely) == (-1)**nu*sqrt(2)*sqrt(pi)*sqrt(1/z)*bessely(-order - S.Half, z)/2 + + # for integral orders rewriting SBFs w.r.t bessel[jy] is allowed + N = Symbol('n', integer=True) + ri = randint(-11, 10) + for order in (ri, N): + for f in (besselj, bessely): + assert yn(order, z) != yn(order, z).rewrite(f) + assert jn(order, z) != jn(order, z).rewrite(f) + assert hn1(order, z) != hn1(order, z).rewrite(f) + assert hn2(order, z) != hn2(order, z).rewrite(f) + + for func, refunc in product((yn, jn, hn1, hn2), + (jn, yn, besselj, bessely)): + assert tn(func(ri, z), func(ri, z).rewrite(refunc), z) + + +def test_expand(): + assert expand_func(besselj(S.Half, z).rewrite(jn)) == \ + sqrt(2)*sin(z)/(sqrt(pi)*sqrt(z)) + assert expand_func(bessely(S.Half, z).rewrite(yn)) == \ + -sqrt(2)*cos(z)/(sqrt(pi)*sqrt(z)) + + # XXX: teach sin/cos to work around arguments like + # x*exp_polar(I*pi*n/2). Then change besselsimp -> expand_func + assert besselsimp(besselj(S.Half, z)) == sqrt(2)*sin(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(besselj(Rational(-1, 2), z)) == sqrt(2)*cos(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(besselj(Rational(5, 2), z)) == \ + -sqrt(2)*(z**2*sin(z) + 3*z*cos(z) - 3*sin(z))/(sqrt(pi)*z**Rational(5, 2)) + assert besselsimp(besselj(Rational(-5, 2), z)) == \ + -sqrt(2)*(z**2*cos(z) - 3*z*sin(z) - 3*cos(z))/(sqrt(pi)*z**Rational(5, 2)) + + assert besselsimp(bessely(S.Half, z)) == \ + -(sqrt(2)*cos(z))/(sqrt(pi)*sqrt(z)) + assert besselsimp(bessely(Rational(-1, 2), z)) == sqrt(2)*sin(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(bessely(Rational(5, 2), z)) == \ + sqrt(2)*(z**2*cos(z) - 3*z*sin(z) - 3*cos(z))/(sqrt(pi)*z**Rational(5, 2)) + assert besselsimp(bessely(Rational(-5, 2), z)) == \ + -sqrt(2)*(z**2*sin(z) + 3*z*cos(z) - 3*sin(z))/(sqrt(pi)*z**Rational(5, 2)) + + assert besselsimp(besseli(S.Half, z)) == sqrt(2)*sinh(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(besseli(Rational(-1, 2), z)) == \ + sqrt(2)*cosh(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(besseli(Rational(5, 2), z)) == \ + sqrt(2)*(z**2*sinh(z) - 3*z*cosh(z) + 3*sinh(z))/(sqrt(pi)*z**Rational(5, 2)) + assert besselsimp(besseli(Rational(-5, 2), z)) == \ + sqrt(2)*(z**2*cosh(z) - 3*z*sinh(z) + 3*cosh(z))/(sqrt(pi)*z**Rational(5, 2)) + + assert besselsimp(besselk(S.Half, z)) == \ + besselsimp(besselk(Rational(-1, 2), z)) == sqrt(pi)*exp(-z)/(sqrt(2)*sqrt(z)) + assert besselsimp(besselk(Rational(5, 2), z)) == \ + besselsimp(besselk(Rational(-5, 2), z)) == \ + sqrt(2)*sqrt(pi)*(z**2 + 3*z + 3)*exp(-z)/(2*z**Rational(5, 2)) + + n = Symbol('n', integer=True, positive=True) + + assert expand_func(besseli(n + 2, z)) == \ + besseli(n, z) + (-2*n - 2)*(-2*n*besseli(n, z)/z + besseli(n - 1, z))/z + assert expand_func(besselj(n + 2, z)) == \ + -besselj(n, z) + (2*n + 2)*(2*n*besselj(n, z)/z - besselj(n - 1, z))/z + assert expand_func(besselk(n + 2, z)) == \ + besselk(n, z) + (2*n + 2)*(2*n*besselk(n, z)/z + besselk(n - 1, z))/z + assert expand_func(bessely(n + 2, z)) == \ + -bessely(n, z) + (2*n + 2)*(2*n*bessely(n, z)/z - bessely(n - 1, z))/z + + assert expand_func(besseli(n + S.Half, z).rewrite(jn)) == \ + (sqrt(2)*sqrt(z)*exp(-I*pi*(n + S.Half)/2) * + exp_polar(I*pi/4)*jn(n, z*exp_polar(I*pi/2))/sqrt(pi)) + assert expand_func(besselj(n + S.Half, z).rewrite(jn)) == \ + sqrt(2)*sqrt(z)*jn(n, z)/sqrt(pi) + + r = Symbol('r', real=True) + p = Symbol('p', positive=True) + i = Symbol('i', integer=True) + + for besselx in [besselj, bessely, besseli, besselk]: + assert besselx(i, p).is_extended_real is True + assert besselx(i, x).is_extended_real is None + assert besselx(x, z).is_extended_real is None + + for besselx in [besselj, besseli]: + assert besselx(i, r).is_extended_real is True + for besselx in [bessely, besselk]: + assert besselx(i, r).is_extended_real is None + + for besselx in [besselj, bessely, besseli, besselk]: + assert expand_func(besselx(oo, x)) == besselx(oo, x, evaluate=False) + assert expand_func(besselx(-oo, x)) == besselx(-oo, x, evaluate=False) + + +# Quite varying time, but often really slow +@slow +def test_slow_expand(): + def check(eq, ans): + return tn(eq, ans) and eq == ans + + rn = randcplx(a=1, b=0, d=0, c=2) + + for besselx in [besselj, bessely, besseli, besselk]: + ri = S(2*randint(-11, 10) + 1) / 2 # half integer in [-21/2, 21/2] + assert tn(besselsimp(besselx(ri, z)), besselx(ri, z)) + + assert check(expand_func(besseli(rn, x)), + besseli(rn - 2, x) - 2*(rn - 1)*besseli(rn - 1, x)/x) + assert check(expand_func(besseli(-rn, x)), + besseli(-rn + 2, x) + 2*(-rn + 1)*besseli(-rn + 1, x)/x) + + assert check(expand_func(besselj(rn, x)), + -besselj(rn - 2, x) + 2*(rn - 1)*besselj(rn - 1, x)/x) + assert check(expand_func(besselj(-rn, x)), + -besselj(-rn + 2, x) + 2*(-rn + 1)*besselj(-rn + 1, x)/x) + + assert check(expand_func(besselk(rn, x)), + besselk(rn - 2, x) + 2*(rn - 1)*besselk(rn - 1, x)/x) + assert check(expand_func(besselk(-rn, x)), + besselk(-rn + 2, x) - 2*(-rn + 1)*besselk(-rn + 1, x)/x) + + assert check(expand_func(bessely(rn, x)), + -bessely(rn - 2, x) + 2*(rn - 1)*bessely(rn - 1, x)/x) + assert check(expand_func(bessely(-rn, x)), + -bessely(-rn + 2, x) + 2*(-rn + 1)*bessely(-rn + 1, x)/x) + + +def mjn(n, z): + return expand_func(jn(n, z)) + + +def myn(n, z): + return expand_func(yn(n, z)) + + +def test_jn(): + z = symbols("z") + assert jn(0, 0) == 1 + assert jn(1, 0) == 0 + assert jn(-1, 0) == S.ComplexInfinity + assert jn(z, 0) == jn(z, 0, evaluate=False) + assert jn(0, oo) == 0 + assert jn(0, -oo) == 0 + + assert mjn(0, z) == sin(z)/z + assert mjn(1, z) == sin(z)/z**2 - cos(z)/z + assert mjn(2, z) == (3/z**3 - 1/z)*sin(z) - (3/z**2) * cos(z) + assert mjn(3, z) == (15/z**4 - 6/z**2)*sin(z) + (1/z - 15/z**3)*cos(z) + assert mjn(4, z) == (1/z + 105/z**5 - 45/z**3)*sin(z) + \ + (-105/z**4 + 10/z**2)*cos(z) + assert mjn(5, z) == (945/z**6 - 420/z**4 + 15/z**2)*sin(z) + \ + (-1/z - 945/z**5 + 105/z**3)*cos(z) + assert mjn(6, z) == (-1/z + 10395/z**7 - 4725/z**5 + 210/z**3)*sin(z) + \ + (-10395/z**6 + 1260/z**4 - 21/z**2)*cos(z) + + assert expand_func(jn(n, z)) == jn(n, z) + + # SBFs not defined for complex-valued orders + assert jn(2+3j, 5.2+0.3j).evalf() == jn(2+3j, 5.2+0.3j) + + assert eq([jn(2, 5.2+0.3j).evalf(10)], + [0.09941975672 - 0.05452508024*I]) + + +def test_yn(): + z = symbols("z") + assert myn(0, z) == -cos(z)/z + assert myn(1, z) == -cos(z)/z**2 - sin(z)/z + assert myn(2, z) == -((3/z**3 - 1/z)*cos(z) + (3/z**2)*sin(z)) + assert expand_func(yn(n, z)) == yn(n, z) + + # SBFs not defined for complex-valued orders + assert yn(2+3j, 5.2+0.3j).evalf() == yn(2+3j, 5.2+0.3j) + + assert eq([yn(2, 5.2+0.3j).evalf(10)], + [0.185250342 + 0.01489557397*I]) + + +def test_sympify_yn(): + assert S(15) in myn(3, pi).atoms() + assert myn(3, pi) == 15/pi**4 - 6/pi**2 + + +def eq(a, b, tol=1e-6): + for u, v in zip(a, b): + if not (abs(u - v) < tol): + return False + return True + + +def test_jn_zeros(): + assert eq(jn_zeros(0, 4), [3.141592, 6.283185, 9.424777, 12.566370]) + assert eq(jn_zeros(1, 4), [4.493409, 7.725251, 10.904121, 14.066193]) + assert eq(jn_zeros(2, 4), [5.763459, 9.095011, 12.322940, 15.514603]) + assert eq(jn_zeros(3, 4), [6.987932, 10.417118, 13.698023, 16.923621]) + assert eq(jn_zeros(4, 4), [8.182561, 11.704907, 15.039664, 18.301255]) + + +def test_bessel_eval(): + n, m, k = Symbol('n', integer=True), Symbol('m'), Symbol('k', integer=True, zero=False) + + for f in [besselj, besseli]: + assert f(0, 0) is S.One + assert f(2.1, 0) is S.Zero + assert f(-3, 0) is S.Zero + assert f(-10.2, 0) is S.ComplexInfinity + assert f(1 + 3*I, 0) is S.Zero + assert f(-3 + I, 0) is S.ComplexInfinity + assert f(-2*I, 0) is S.NaN + assert f(n, 0) != S.One and f(n, 0) != S.Zero + assert f(m, 0) != S.One and f(m, 0) != S.Zero + assert f(k, 0) is S.Zero + + assert bessely(0, 0) is S.NegativeInfinity + assert besselk(0, 0) is S.Infinity + for f in [bessely, besselk]: + assert f(1 + I, 0) is S.ComplexInfinity + assert f(I, 0) is S.NaN + + for f in [besselj, bessely]: + assert f(m, S.Infinity) is S.Zero + assert f(m, S.NegativeInfinity) is S.Zero + + for f in [besseli, besselk]: + assert f(m, I*S.Infinity) is S.Zero + assert f(m, I*S.NegativeInfinity) is S.Zero + + for f in [besseli, besselk]: + assert f(-4, z) == f(4, z) + assert f(-3, z) == f(3, z) + assert f(-n, z) == f(n, z) + assert f(-m, z) != f(m, z) + + for f in [besselj, bessely]: + assert f(-4, z) == f(4, z) + assert f(-3, z) == -f(3, z) + assert f(-n, z) == (-1)**n*f(n, z) + assert f(-m, z) != (-1)**m*f(m, z) + + for f in [besselj, besseli]: + assert f(m, -z) == (-z)**m*z**(-m)*f(m, z) + + assert besseli(2, -z) == besseli(2, z) + assert besseli(3, -z) == -besseli(3, z) + + assert besselj(0, -z) == besselj(0, z) + assert besselj(1, -z) == -besselj(1, z) + + assert besseli(0, I*z) == besselj(0, z) + assert besseli(1, I*z) == I*besselj(1, z) + assert besselj(3, I*z) == -I*besseli(3, z) + + +def test_bessel_nan(): + # FIXME: could have these return NaN; for now just fix infinite recursion + for f in [besselj, bessely, besseli, besselk, hankel1, hankel2, yn, jn]: + assert f(1, S.NaN) == f(1, S.NaN, evaluate=False) + + +def test_meromorphic(): + assert besselj(2, x).is_meromorphic(x, 1) == True + assert besselj(2, x).is_meromorphic(x, 0) == True + assert besselj(2, x).is_meromorphic(x, oo) == False + assert besselj(S(2)/3, x).is_meromorphic(x, 1) == True + assert besselj(S(2)/3, x).is_meromorphic(x, 0) == False + assert besselj(S(2)/3, x).is_meromorphic(x, oo) == False + assert besselj(x, 2*x).is_meromorphic(x, 2) == False + assert besselk(0, x).is_meromorphic(x, 1) == True + assert besselk(2, x).is_meromorphic(x, 0) == True + assert besseli(0, x).is_meromorphic(x, 1) == True + assert besseli(2, x).is_meromorphic(x, 0) == True + assert bessely(0, x).is_meromorphic(x, 1) == True + assert bessely(0, x).is_meromorphic(x, 0) == False + assert bessely(2, x).is_meromorphic(x, 0) == True + assert hankel1(3, x**2 + 2*x).is_meromorphic(x, 1) == True + assert hankel1(0, x).is_meromorphic(x, 0) == False + assert hankel2(11, 4).is_meromorphic(x, 5) == True + assert hn1(6, 7*x**3 + 4).is_meromorphic(x, 7) == True + assert hn2(3, 2*x).is_meromorphic(x, 9) == True + assert jn(5, 2*x + 7).is_meromorphic(x, 4) == True + assert yn(8, x**2 + 11).is_meromorphic(x, 6) == True + + +def test_conjugate(): + n = Symbol('n') + z = Symbol('z', extended_real=False) + x = Symbol('x', extended_real=True) + y = Symbol('y', positive=True) + t = Symbol('t', negative=True) + + for f in [besseli, besselj, besselk, bessely, hankel1, hankel2]: + assert f(n, -1).conjugate() != f(conjugate(n), -1) + assert f(n, x).conjugate() != f(conjugate(n), x) + assert f(n, t).conjugate() != f(conjugate(n), t) + + rz = randcplx(b=0.5) + + for f in [besseli, besselj, besselk, bessely]: + assert f(n, 1 + I).conjugate() == f(conjugate(n), 1 - I) + assert f(n, 0).conjugate() == f(conjugate(n), 0) + assert f(n, 1).conjugate() == f(conjugate(n), 1) + assert f(n, z).conjugate() == f(conjugate(n), conjugate(z)) + assert f(n, y).conjugate() == f(conjugate(n), y) + assert tn(f(n, rz).conjugate(), f(conjugate(n), conjugate(rz))) + + assert hankel1(n, 1 + I).conjugate() == hankel2(conjugate(n), 1 - I) + assert hankel1(n, 0).conjugate() == hankel2(conjugate(n), 0) + assert hankel1(n, 1).conjugate() == hankel2(conjugate(n), 1) + assert hankel1(n, y).conjugate() == hankel2(conjugate(n), y) + assert hankel1(n, z).conjugate() == hankel2(conjugate(n), conjugate(z)) + assert tn(hankel1(n, rz).conjugate(), hankel2(conjugate(n), conjugate(rz))) + + assert hankel2(n, 1 + I).conjugate() == hankel1(conjugate(n), 1 - I) + assert hankel2(n, 0).conjugate() == hankel1(conjugate(n), 0) + assert hankel2(n, 1).conjugate() == hankel1(conjugate(n), 1) + assert hankel2(n, y).conjugate() == hankel1(conjugate(n), y) + assert hankel2(n, z).conjugate() == hankel1(conjugate(n), conjugate(z)) + assert tn(hankel2(n, rz).conjugate(), hankel1(conjugate(n), conjugate(rz))) + + +def test_branching(): + assert besselj(polar_lift(k), x) == besselj(k, x) + assert besseli(polar_lift(k), x) == besseli(k, x) + + n = Symbol('n', integer=True) + assert besselj(n, exp_polar(2*pi*I)*x) == besselj(n, x) + assert besselj(n, polar_lift(x)) == besselj(n, x) + assert besseli(n, exp_polar(2*pi*I)*x) == besseli(n, x) + assert besseli(n, polar_lift(x)) == besseli(n, x) + + def tn(func, s): + from sympy.core.random import uniform + c = uniform(1, 5) + expr = func(s, c*exp_polar(I*pi)) - func(s, c*exp_polar(-I*pi)) + eps = 1e-15 + expr2 = func(s + eps, -c + eps*I) - func(s + eps, -c - eps*I) + return abs(expr.n() - expr2.n()).n() < 1e-10 + + nu = Symbol('nu') + assert besselj(nu, exp_polar(2*pi*I)*x) == exp(2*pi*I*nu)*besselj(nu, x) + assert besseli(nu, exp_polar(2*pi*I)*x) == exp(2*pi*I*nu)*besseli(nu, x) + assert tn(besselj, 2) + assert tn(besselj, pi) + assert tn(besselj, I) + assert tn(besseli, 2) + assert tn(besseli, pi) + assert tn(besseli, I) + + +def test_airy_base(): + z = Symbol('z') + x = Symbol('x', real=True) + y = Symbol('y', real=True) + + assert conjugate(airyai(z)) == airyai(conjugate(z)) + assert airyai(x).is_extended_real + + assert airyai(x+I*y).as_real_imag() == ( + airyai(x - I*y)/2 + airyai(x + I*y)/2, + I*(airyai(x - I*y) - airyai(x + I*y))/2) + + +def test_airyai(): + z = Symbol('z', real=False) + t = Symbol('t', negative=True) + p = Symbol('p', positive=True) + + assert isinstance(airyai(z), airyai) + + assert airyai(0) == 3**Rational(1, 3)/(3*gamma(Rational(2, 3))) + assert airyai(oo) == 0 + assert airyai(-oo) == 0 + + assert diff(airyai(z), z) == airyaiprime(z) + + assert series(airyai(z), z, 0, 3) == ( + 3**Rational(5, 6)*gamma(Rational(1, 3))/(6*pi) - 3**Rational(1, 6)*z*gamma(Rational(2, 3))/(2*pi) + O(z**3)) + + assert airyai(z).rewrite(hyper) == ( + -3**Rational(2, 3)*z*hyper((), (Rational(4, 3),), z**3/9)/(3*gamma(Rational(1, 3))) + + 3**Rational(1, 3)*hyper((), (Rational(2, 3),), z**3/9)/(3*gamma(Rational(2, 3)))) + + assert isinstance(airyai(z).rewrite(besselj), airyai) + assert airyai(t).rewrite(besselj) == ( + sqrt(-t)*(besselj(Rational(-1, 3), 2*(-t)**Rational(3, 2)/3) + + besselj(Rational(1, 3), 2*(-t)**Rational(3, 2)/3))/3) + assert airyai(z).rewrite(besseli) == ( + -z*besseli(Rational(1, 3), 2*z**Rational(3, 2)/3)/(3*(z**Rational(3, 2))**Rational(1, 3)) + + (z**Rational(3, 2))**Rational(1, 3)*besseli(Rational(-1, 3), 2*z**Rational(3, 2)/3)/3) + assert airyai(p).rewrite(besseli) == ( + sqrt(p)*(besseli(Rational(-1, 3), 2*p**Rational(3, 2)/3) - + besseli(Rational(1, 3), 2*p**Rational(3, 2)/3))/3) + + assert expand_func(airyai(2*(3*z**5)**Rational(1, 3))) == ( + -sqrt(3)*(-1 + (z**5)**Rational(1, 3)/z**Rational(5, 3))*airybi(2*3**Rational(1, 3)*z**Rational(5, 3))/6 + + (1 + (z**5)**Rational(1, 3)/z**Rational(5, 3))*airyai(2*3**Rational(1, 3)*z**Rational(5, 3))/2) + + +def test_airybi(): + z = Symbol('z', real=False) + t = Symbol('t', negative=True) + p = Symbol('p', positive=True) + + assert isinstance(airybi(z), airybi) + + assert airybi(0) == 3**Rational(5, 6)/(3*gamma(Rational(2, 3))) + assert airybi(oo) is oo + assert airybi(-oo) == 0 + + assert diff(airybi(z), z) == airybiprime(z) + + assert series(airybi(z), z, 0, 3) == ( + 3**Rational(1, 3)*gamma(Rational(1, 3))/(2*pi) + 3**Rational(2, 3)*z*gamma(Rational(2, 3))/(2*pi) + O(z**3)) + + assert airybi(z).rewrite(hyper) == ( + 3**Rational(1, 6)*z*hyper((), (Rational(4, 3),), z**3/9)/gamma(Rational(1, 3)) + + 3**Rational(5, 6)*hyper((), (Rational(2, 3),), z**3/9)/(3*gamma(Rational(2, 3)))) + + assert isinstance(airybi(z).rewrite(besselj), airybi) + assert airyai(t).rewrite(besselj) == ( + sqrt(-t)*(besselj(Rational(-1, 3), 2*(-t)**Rational(3, 2)/3) + + besselj(Rational(1, 3), 2*(-t)**Rational(3, 2)/3))/3) + assert airybi(z).rewrite(besseli) == ( + sqrt(3)*(z*besseli(Rational(1, 3), 2*z**Rational(3, 2)/3)/(z**Rational(3, 2))**Rational(1, 3) + + (z**Rational(3, 2))**Rational(1, 3)*besseli(Rational(-1, 3), 2*z**Rational(3, 2)/3))/3) + assert airybi(p).rewrite(besseli) == ( + sqrt(3)*sqrt(p)*(besseli(Rational(-1, 3), 2*p**Rational(3, 2)/3) + + besseli(Rational(1, 3), 2*p**Rational(3, 2)/3))/3) + + assert expand_func(airybi(2*(3*z**5)**Rational(1, 3))) == ( + sqrt(3)*(1 - (z**5)**Rational(1, 3)/z**Rational(5, 3))*airyai(2*3**Rational(1, 3)*z**Rational(5, 3))/2 + + (1 + (z**5)**Rational(1, 3)/z**Rational(5, 3))*airybi(2*3**Rational(1, 3)*z**Rational(5, 3))/2) + + +def test_airyaiprime(): + z = Symbol('z', real=False) + t = Symbol('t', negative=True) + p = Symbol('p', positive=True) + + assert isinstance(airyaiprime(z), airyaiprime) + + assert airyaiprime(0) == -3**Rational(2, 3)/(3*gamma(Rational(1, 3))) + assert airyaiprime(oo) == 0 + + assert diff(airyaiprime(z), z) == z*airyai(z) + + assert series(airyaiprime(z), z, 0, 3) == ( + -3**Rational(2, 3)/(3*gamma(Rational(1, 3))) + 3**Rational(1, 3)*z**2/(6*gamma(Rational(2, 3))) + O(z**3)) + + assert airyaiprime(z).rewrite(hyper) == ( + 3**Rational(1, 3)*z**2*hyper((), (Rational(5, 3),), z**3/9)/(6*gamma(Rational(2, 3))) - + 3**Rational(2, 3)*hyper((), (Rational(1, 3),), z**3/9)/(3*gamma(Rational(1, 3)))) + + assert isinstance(airyaiprime(z).rewrite(besselj), airyaiprime) + assert airyai(t).rewrite(besselj) == ( + sqrt(-t)*(besselj(Rational(-1, 3), 2*(-t)**Rational(3, 2)/3) + + besselj(Rational(1, 3), 2*(-t)**Rational(3, 2)/3))/3) + assert airyaiprime(z).rewrite(besseli) == ( + z**2*besseli(Rational(2, 3), 2*z**Rational(3, 2)/3)/(3*(z**Rational(3, 2))**Rational(2, 3)) - + (z**Rational(3, 2))**Rational(2, 3)*besseli(Rational(-1, 3), 2*z**Rational(3, 2)/3)/3) + assert airyaiprime(p).rewrite(besseli) == ( + p*(-besseli(Rational(-2, 3), 2*p**Rational(3, 2)/3) + besseli(Rational(2, 3), 2*p**Rational(3, 2)/3))/3) + + assert expand_func(airyaiprime(2*(3*z**5)**Rational(1, 3))) == ( + sqrt(3)*(z**Rational(5, 3)/(z**5)**Rational(1, 3) - 1)*airybiprime(2*3**Rational(1, 3)*z**Rational(5, 3))/6 + + (z**Rational(5, 3)/(z**5)**Rational(1, 3) + 1)*airyaiprime(2*3**Rational(1, 3)*z**Rational(5, 3))/2) + + +def test_airybiprime(): + z = Symbol('z', real=False) + t = Symbol('t', negative=True) + p = Symbol('p', positive=True) + + assert isinstance(airybiprime(z), airybiprime) + + assert airybiprime(0) == 3**Rational(1, 6)/gamma(Rational(1, 3)) + assert airybiprime(oo) is oo + assert airybiprime(-oo) == 0 + + assert diff(airybiprime(z), z) == z*airybi(z) + + assert series(airybiprime(z), z, 0, 3) == ( + 3**Rational(1, 6)/gamma(Rational(1, 3)) + 3**Rational(5, 6)*z**2/(6*gamma(Rational(2, 3))) + O(z**3)) + + assert airybiprime(z).rewrite(hyper) == ( + 3**Rational(5, 6)*z**2*hyper((), (Rational(5, 3),), z**3/9)/(6*gamma(Rational(2, 3))) + + 3**Rational(1, 6)*hyper((), (Rational(1, 3),), z**3/9)/gamma(Rational(1, 3))) + + assert isinstance(airybiprime(z).rewrite(besselj), airybiprime) + assert airyai(t).rewrite(besselj) == ( + sqrt(-t)*(besselj(Rational(-1, 3), 2*(-t)**Rational(3, 2)/3) + + besselj(Rational(1, 3), 2*(-t)**Rational(3, 2)/3))/3) + assert airybiprime(z).rewrite(besseli) == ( + sqrt(3)*(z**2*besseli(Rational(2, 3), 2*z**Rational(3, 2)/3)/(z**Rational(3, 2))**Rational(2, 3) + + (z**Rational(3, 2))**Rational(2, 3)*besseli(Rational(-2, 3), 2*z**Rational(3, 2)/3))/3) + assert airybiprime(p).rewrite(besseli) == ( + sqrt(3)*p*(besseli(Rational(-2, 3), 2*p**Rational(3, 2)/3) + besseli(Rational(2, 3), 2*p**Rational(3, 2)/3))/3) + + assert expand_func(airybiprime(2*(3*z**5)**Rational(1, 3))) == ( + sqrt(3)*(z**Rational(5, 3)/(z**5)**Rational(1, 3) - 1)*airyaiprime(2*3**Rational(1, 3)*z**Rational(5, 3))/2 + + (z**Rational(5, 3)/(z**5)**Rational(1, 3) + 1)*airybiprime(2*3**Rational(1, 3)*z**Rational(5, 3))/2) + + +def test_marcumq(): + m = Symbol('m') + a = Symbol('a') + b = Symbol('b') + + assert marcumq(0, 0, 0) == 0 + assert marcumq(m, 0, b) == uppergamma(m, b**2/2)/gamma(m) + assert marcumq(2, 0, 5) == 27*exp(Rational(-25, 2))/2 + assert marcumq(0, a, 0) == 1 - exp(-a**2/2) + assert marcumq(0, pi, 0) == 1 - exp(-pi**2/2) + assert marcumq(1, a, a) == S.Half + exp(-a**2)*besseli(0, a**2)/2 + assert marcumq(2, a, a) == S.Half + exp(-a**2)*besseli(0, a**2)/2 + exp(-a**2)*besseli(1, a**2) + + assert diff(marcumq(1, a, 3), a) == a*(-marcumq(1, a, 3) + marcumq(2, a, 3)) + assert diff(marcumq(2, 3, b), b) == -b**2*exp(-b**2/2 - Rational(9, 2))*besseli(1, 3*b)/3 + + x = Symbol('x') + assert marcumq(2, 3, 4).rewrite(Integral, x=x) == \ + Integral(x**2*exp(-x**2/2 - Rational(9, 2))*besseli(1, 3*x), (x, 4, oo))/3 + assert eq([marcumq(5, -2, 3).rewrite(Integral).evalf(10)], + [0.7905769565]) + + k = Symbol('k') + assert marcumq(-3, -5, -7).rewrite(Sum, k=k) == \ + exp(-37)*Sum((Rational(5, 7))**k*besseli(k, 35), (k, 4, oo)) + assert eq([marcumq(1, 3, 1).rewrite(Sum).evalf(10)], + [0.9891705502]) + + assert marcumq(1, a, a, evaluate=False).rewrite(besseli) == S.Half + exp(-a**2)*besseli(0, a**2)/2 + assert marcumq(2, a, a, evaluate=False).rewrite(besseli) == S.Half + exp(-a**2)*besseli(0, a**2)/2 + \ + exp(-a**2)*besseli(1, a**2) + assert marcumq(3, a, a).rewrite(besseli) == (besseli(1, a**2) + besseli(2, a**2))*exp(-a**2) + \ + S.Half + exp(-a**2)*besseli(0, a**2)/2 + assert marcumq(5, 8, 8).rewrite(besseli) == exp(-64)*besseli(0, 64)/2 + \ + (besseli(4, 64) + besseli(3, 64) + besseli(2, 64) + besseli(1, 64))*exp(-64) + S.Half + assert marcumq(m, a, a).rewrite(besseli) == marcumq(m, a, a) + + x = Symbol('x', integer=True) + assert marcumq(x, a, a).rewrite(besseli) == marcumq(x, a, a) + + +def test_issue_26134(): + x = Symbol('x') + assert marcumq(2, 3, 4).rewrite(Integral, x=x).dummy_eq( + Integral(x**2*exp(-x**2/2 - Rational(9, 2))*besseli(1, 3*x), (x, 4, oo))/3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_beta_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_beta_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..b34cb2febf9e2746d869cd878525d2794535aea5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_beta_functions.py @@ -0,0 +1,89 @@ +from sympy.core.function import (diff, expand_func) +from sympy.core.numbers import I, Rational, pi +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.combinatorial.numbers import catalan +from sympy.functions.elementary.complexes import conjugate +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.special.beta_functions import (beta, betainc, betainc_regularized) +from sympy.functions.special.gamma_functions import gamma, polygamma +from sympy.functions.special.hyper import hyper +from sympy.integrals.integrals import Integral +from sympy.core.function import ArgumentIndexError +from sympy.core.expr import unchanged +from sympy.testing.pytest import raises + + +def test_beta(): + x, y = symbols('x y') + t = Dummy('t') + + assert unchanged(beta, x, y) + assert unchanged(beta, x, x) + + assert beta(5, -3).is_real == True + assert beta(3, y).is_real is None + + assert expand_func(beta(x, y)) == gamma(x)*gamma(y)/gamma(x + y) + assert expand_func(beta(x, y) - beta(y, x)) == 0 # Symmetric + assert expand_func(beta(x, y)) == expand_func(beta(x, y + 1) + beta(x + 1, y)).simplify() + + assert diff(beta(x, y), x) == beta(x, y)*(polygamma(0, x) - polygamma(0, x + y)) + assert diff(beta(x, y), y) == beta(x, y)*(polygamma(0, y) - polygamma(0, x + y)) + + assert conjugate(beta(x, y)) == beta(conjugate(x), conjugate(y)) + + raises(ArgumentIndexError, lambda: beta(x, y).fdiff(3)) + + assert beta(x, y).rewrite(gamma) == gamma(x)*gamma(y)/gamma(x + y) + assert beta(x).rewrite(gamma) == gamma(x)**2/gamma(2*x) + assert beta(x, y).rewrite(Integral).dummy_eq(Integral(t**(x - 1) * (1 - t)**(y - 1), (t, 0, 1))) + assert beta(Rational(-19, 10), Rational(-1, 10)) == S.Zero + assert beta(Rational(-19, 10), Rational(-9, 10)) == \ + 800*2**(S(4)/5)*sqrt(pi)*gamma(S.One/10)/(171*gamma(-S(7)/5)) + assert beta(Rational(19, 10), Rational(29, 10)) == 100/(551*catalan(Rational(19, 10))) + assert beta(1, 0) == S.ComplexInfinity + assert beta(0, 1) == S.ComplexInfinity + assert beta(2, 3) == S.One/12 + assert unchanged(beta, x, x + 1) + assert unchanged(beta, x, 1) + assert unchanged(beta, 1, y) + assert beta(x, x + 1).doit() == 1/(x*(x+1)*catalan(x)) + assert beta(1, y).doit() == 1/y + assert beta(x, 1).doit() == 1/x + assert beta(Rational(-19, 10), Rational(-1, 10), evaluate=False).doit() == S.Zero + assert beta(2) == beta(2, 2) + assert beta(x, evaluate=False) != beta(x, x) + assert beta(x, evaluate=False).doit() == beta(x, x) + + +def test_betainc(): + a, b, x1, x2 = symbols('a b x1 x2') + + assert unchanged(betainc, a, b, x1, x2) + assert unchanged(betainc, a, b, 0, x1) + + assert betainc(1, 2, 0, -5).is_real == True + assert betainc(1, 2, 0, x2).is_real is None + assert conjugate(betainc(I, 2, 3 - I, 1 + 4*I)) == betainc(-I, 2, 3 + I, 1 - 4*I) + + assert betainc(a, b, 0, 1).rewrite(Integral).dummy_eq(beta(a, b).rewrite(Integral)) + assert betainc(1, 2, 0, x2).rewrite(hyper) == x2*hyper((1, -1), (2,), x2) + + assert betainc(1, 2, 3, 3).evalf() == 0 + + +def test_betainc_regularized(): + a, b, x1, x2 = symbols('a b x1 x2') + + assert unchanged(betainc_regularized, a, b, x1, x2) + assert unchanged(betainc_regularized, a, b, 0, x1) + + assert betainc_regularized(3, 5, 0, -1).is_real == True + assert betainc_regularized(3, 5, 0, x2).is_real is None + assert conjugate(betainc_regularized(3*I, 1, 2 + I, 1 + 2*I)) == betainc_regularized(-3*I, 1, 2 - I, 1 - 2*I) + + assert betainc_regularized(a, b, 0, 1).rewrite(Integral) == 1 + assert betainc_regularized(1, 2, x1, x2).rewrite(hyper) == 2*x2*hyper((1, -1), (2,), x2) - 2*x1*hyper((1, -1), (2,), x1) + + assert betainc_regularized(4, 1, 5, 5).evalf() == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bsplines.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bsplines.py new file mode 100644 index 0000000000000000000000000000000000000000..136831b96ba16c95edba12ecd47b6f1566b68427 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_bsplines.py @@ -0,0 +1,167 @@ +from sympy.functions import bspline_basis_set, interpolating_spline +from sympy.core.numbers import Rational +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.piecewise import Piecewise +from sympy.logic.boolalg import And +from sympy.sets.sets import Interval +from sympy.testing.pytest import slow + +x, y = symbols('x,y') + + +def test_basic_degree_0(): + d = 0 + knots = range(5) + splines = bspline_basis_set(d, knots, x) + for i in range(len(splines)): + assert splines[i] == Piecewise((1, Interval(i, i + 1).contains(x)), + (0, True)) + + +def test_basic_degree_1(): + d = 1 + knots = range(5) + splines = bspline_basis_set(d, knots, x) + assert splines[0] == Piecewise((x, Interval(0, 1).contains(x)), + (2 - x, Interval(1, 2).contains(x)), + (0, True)) + assert splines[1] == Piecewise((-1 + x, Interval(1, 2).contains(x)), + (3 - x, Interval(2, 3).contains(x)), + (0, True)) + assert splines[2] == Piecewise((-2 + x, Interval(2, 3).contains(x)), + (4 - x, Interval(3, 4).contains(x)), + (0, True)) + + +def test_basic_degree_2(): + d = 2 + knots = range(5) + splines = bspline_basis_set(d, knots, x) + b0 = Piecewise((x**2/2, Interval(0, 1).contains(x)), + (Rational(-3, 2) + 3*x - x**2, Interval(1, 2).contains(x)), + (Rational(9, 2) - 3*x + x**2/2, Interval(2, 3).contains(x)), + (0, True)) + b1 = Piecewise((S.Half - x + x**2/2, Interval(1, 2).contains(x)), + (Rational(-11, 2) + 5*x - x**2, Interval(2, 3).contains(x)), + (8 - 4*x + x**2/2, Interval(3, 4).contains(x)), + (0, True)) + assert splines[0] == b0 + assert splines[1] == b1 + + +def test_basic_degree_3(): + d = 3 + knots = range(5) + splines = bspline_basis_set(d, knots, x) + b0 = Piecewise( + (x**3/6, Interval(0, 1).contains(x)), + (Rational(2, 3) - 2*x + 2*x**2 - x**3/2, Interval(1, 2).contains(x)), + (Rational(-22, 3) + 10*x - 4*x**2 + x**3/2, Interval(2, 3).contains(x)), + (Rational(32, 3) - 8*x + 2*x**2 - x**3/6, Interval(3, 4).contains(x)), + (0, True) + ) + assert splines[0] == b0 + + +def test_repeated_degree_1(): + d = 1 + knots = [0, 0, 1, 2, 2, 3, 4, 4] + splines = bspline_basis_set(d, knots, x) + assert splines[0] == Piecewise((1 - x, Interval(0, 1).contains(x)), + (0, True)) + assert splines[1] == Piecewise((x, Interval(0, 1).contains(x)), + (2 - x, Interval(1, 2).contains(x)), + (0, True)) + assert splines[2] == Piecewise((-1 + x, Interval(1, 2).contains(x)), + (0, True)) + assert splines[3] == Piecewise((3 - x, Interval(2, 3).contains(x)), + (0, True)) + assert splines[4] == Piecewise((-2 + x, Interval(2, 3).contains(x)), + (4 - x, Interval(3, 4).contains(x)), + (0, True)) + assert splines[5] == Piecewise((-3 + x, Interval(3, 4).contains(x)), + (0, True)) + + +def test_repeated_degree_2(): + d = 2 + knots = [0, 0, 1, 2, 2, 3, 4, 4] + splines = bspline_basis_set(d, knots, x) + + assert splines[0] == Piecewise(((-3*x**2/2 + 2*x), And(x <= 1, x >= 0)), + (x**2/2 - 2*x + 2, And(x <= 2, x >= 1)), + (0, True)) + assert splines[1] == Piecewise((x**2/2, And(x <= 1, x >= 0)), + (-3*x**2/2 + 4*x - 2, And(x <= 2, x >= 1)), + (0, True)) + assert splines[2] == Piecewise((x**2 - 2*x + 1, And(x <= 2, x >= 1)), + (x**2 - 6*x + 9, And(x <= 3, x >= 2)), + (0, True)) + assert splines[3] == Piecewise((-3*x**2/2 + 8*x - 10, And(x <= 3, x >= 2)), + (x**2/2 - 4*x + 8, And(x <= 4, x >= 3)), + (0, True)) + assert splines[4] == Piecewise((x**2/2 - 2*x + 2, And(x <= 3, x >= 2)), + (-3*x**2/2 + 10*x - 16, And(x <= 4, x >= 3)), + (0, True)) + +# Tests for interpolating_spline + + +def test_10_points_degree_1(): + d = 1 + X = [-5, 2, 3, 4, 7, 9, 10, 30, 31, 34] + Y = [-10, -2, 2, 4, 7, 6, 20, 45, 19, 25] + spline = interpolating_spline(d, x, X, Y) + + assert spline == Piecewise((x*Rational(8, 7) - Rational(30, 7), (x >= -5) & (x <= 2)), (4*x - 10, (x >= 2) & (x <= 3)), + (2*x - 4, (x >= 3) & (x <= 4)), (x, (x >= 4) & (x <= 7)), + (-x/2 + Rational(21, 2), (x >= 7) & (x <= 9)), (14*x - 120, (x >= 9) & (x <= 10)), + (x*Rational(5, 4) + Rational(15, 2), (x >= 10) & (x <= 30)), (-26*x + 825, (x >= 30) & (x <= 31)), + (2*x - 43, (x >= 31) & (x <= 34))) + + +def test_3_points_degree_2(): + d = 2 + X = [-3, 10, 19] + Y = [3, -4, 30] + spline = interpolating_spline(d, x, X, Y) + + assert spline == Piecewise((505*x**2/2574 - x*Rational(4921, 2574) - Rational(1931, 429), (x >= -3) & (x <= 19))) + + +def test_5_points_degree_2(): + d = 2 + X = [-3, 2, 4, 5, 10] + Y = [-1, 2, 5, 10, 14] + spline = interpolating_spline(d, x, X, Y) + + assert spline == Piecewise((4*x**2/329 + x*Rational(1007, 1645) + Rational(1196, 1645), (x >= -3) & (x <= 3)), + (2701*x**2/1645 - x*Rational(15079, 1645) + Rational(5065, 329), (x >= 3) & (x <= Rational(9, 2))), + (-1319*x**2/1645 + x*Rational(21101, 1645) - Rational(11216, 329), (x >= Rational(9, 2)) & (x <= 10))) + + +@slow +def test_6_points_degree_3(): + d = 3 + X = [-1, 0, 2, 3, 9, 12] + Y = [-4, 3, 3, 7, 9, 20] + spline = interpolating_spline(d, x, X, Y) + + assert spline == Piecewise((6058*x**3/5301 - 18427*x**2/5301 + x*Rational(12622, 5301) + 3, (x >= -1) & (x <= 2)), + (-8327*x**3/5301 + 67883*x**2/5301 - x*Rational(159998, 5301) + Rational(43661, 1767), (x >= 2) & (x <= 3)), + (5414*x**3/47709 - 1386*x**2/589 + x*Rational(4267, 279) - Rational(12232, 589), (x >= 3) & (x <= 12))) + + +def test_issue_19262(): + Delta = symbols('Delta', positive=True) + knots = [i*Delta for i in range(4)] + basis = bspline_basis_set(1, knots, x) + y = symbols('y', nonnegative=True) + basis2 = bspline_basis_set(1, knots, y) + assert basis[0].subs(x, y) == basis2[0] + assert interpolating_spline(1, x, + [Delta*i for i in [1, 2, 4, 7]], [3, 6, 5, 7] + ) == Piecewise((3*x/Delta, (Delta <= x) & (x <= 2*Delta)), + (7 - x/(2*Delta), (x >= 2*Delta) & (x <= 4*Delta)), + (Rational(7, 3) + 2*x/(3*Delta), (x >= 4*Delta) & (x <= 7*Delta))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_delta_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_delta_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..d5a39d9e352143cf878cf69fa42f454f58be65c9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_delta_functions.py @@ -0,0 +1,165 @@ +from sympy.core.numbers import (I, nan, oo, pi) +from sympy.core.relational import (Eq, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (adjoint, conjugate, sign, transpose) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.delta_functions import (DiracDelta, Heaviside) +from sympy.functions.special.singularity_functions import SingularityFunction +from sympy.simplify.simplify import signsimp + + +from sympy.testing.pytest import raises + +from sympy.core.expr import unchanged + +from sympy.core.function import ArgumentIndexError + + +x, y = symbols('x y') +i = symbols('t', nonzero=True) +j = symbols('j', positive=True) +k = symbols('k', negative=True) + +def test_DiracDelta(): + assert DiracDelta(1) == 0 + assert DiracDelta(5.1) == 0 + assert DiracDelta(-pi) == 0 + assert DiracDelta(5, 7) == 0 + assert DiracDelta(x, 0) == DiracDelta(x) + assert DiracDelta(i) == 0 + assert DiracDelta(j) == 0 + assert DiracDelta(k) == 0 + assert DiracDelta(nan) is nan + assert DiracDelta(0).func is DiracDelta + assert DiracDelta(x).func is DiracDelta + # FIXME: this is generally undefined @ x=0 + # But then limit(Delta(c)*Heaviside(x),x,-oo) + # need's to be implemented. + # assert 0*DiracDelta(x) == 0 + + assert adjoint(DiracDelta(x)) == DiracDelta(x) + assert adjoint(DiracDelta(x - y)) == DiracDelta(x - y) + assert conjugate(DiracDelta(x)) == DiracDelta(x) + assert conjugate(DiracDelta(x - y)) == DiracDelta(x - y) + assert transpose(DiracDelta(x)) == DiracDelta(x) + assert transpose(DiracDelta(x - y)) == DiracDelta(x - y) + + assert DiracDelta(x).diff(x) == DiracDelta(x, 1) + assert DiracDelta(x, 1).diff(x) == DiracDelta(x, 2) + + assert DiracDelta(x).is_simple(x) is True + assert DiracDelta(3*x).is_simple(x) is True + assert DiracDelta(x**2).is_simple(x) is False + assert DiracDelta(sqrt(x)).is_simple(x) is False + assert DiracDelta(x).is_simple(y) is False + + assert DiracDelta(x*y).expand(diracdelta=True, wrt=x) == DiracDelta(x)/abs(y) + assert DiracDelta(x*y).expand(diracdelta=True, wrt=y) == DiracDelta(y)/abs(x) + assert DiracDelta(x**2*y).expand(diracdelta=True, wrt=x) == DiracDelta(x**2*y) + assert DiracDelta(y).expand(diracdelta=True, wrt=x) == DiracDelta(y) + assert DiracDelta((x - 1)*(x - 2)*(x - 3)).expand(diracdelta=True, wrt=x) == ( + DiracDelta(x - 3)/2 + DiracDelta(x - 2) + DiracDelta(x - 1)/2) + + assert DiracDelta(2*x) != DiracDelta(x) # scaling property + assert DiracDelta(x) == DiracDelta(-x) # even function + assert DiracDelta(-x, 2) == DiracDelta(x, 2) + assert DiracDelta(-x, 1) == -DiracDelta(x, 1) # odd deriv is odd + assert DiracDelta(-oo*x) == DiracDelta(oo*x) + assert DiracDelta(x - y) != DiracDelta(y - x) + assert signsimp(DiracDelta(x - y) - DiracDelta(y - x)) == 0 + + assert DiracDelta(x*y).expand(diracdelta=True, wrt=x) == DiracDelta(x)/abs(y) + assert DiracDelta(x*y).expand(diracdelta=True, wrt=y) == DiracDelta(y)/abs(x) + assert DiracDelta(x**2*y).expand(diracdelta=True, wrt=x) == DiracDelta(x**2*y) + assert DiracDelta(y).expand(diracdelta=True, wrt=x) == DiracDelta(y) + assert DiracDelta((x - 1)*(x - 2)*(x - 3)).expand(diracdelta=True) == ( + DiracDelta(x - 3)/2 + DiracDelta(x - 2) + DiracDelta(x - 1)/2) + + raises(ArgumentIndexError, lambda: DiracDelta(x).fdiff(2)) + raises(ValueError, lambda: DiracDelta(x, -1)) + raises(ValueError, lambda: DiracDelta(I)) + raises(ValueError, lambda: DiracDelta(2 + 3*I)) + + +def test_heaviside(): + assert Heaviside(-5) == 0 + assert Heaviside(1) == 1 + assert Heaviside(0) == S.Half + + assert Heaviside(0, x) == x + assert unchanged(Heaviside,x, nan) + assert Heaviside(0, nan) == nan + + h0 = Heaviside(x, 0) + h12 = Heaviside(x, S.Half) + h1 = Heaviside(x, 1) + + assert h0.args == h0.pargs == (x, 0) + assert h1.args == h1.pargs == (x, 1) + assert h12.args == (x, S.Half) + assert h12.pargs == (x,) # default 1/2 suppressed + + assert adjoint(Heaviside(x)) == Heaviside(x) + assert adjoint(Heaviside(x - y)) == Heaviside(x - y) + assert conjugate(Heaviside(x)) == Heaviside(x) + assert conjugate(Heaviside(x - y)) == Heaviside(x - y) + assert transpose(Heaviside(x)) == Heaviside(x) + assert transpose(Heaviside(x - y)) == Heaviside(x - y) + + assert Heaviside(x).diff(x) == DiracDelta(x) + assert Heaviside(x + I).is_Function is True + assert Heaviside(I*x).is_Function is True + + raises(ArgumentIndexError, lambda: Heaviside(x).fdiff(2)) + raises(ValueError, lambda: Heaviside(I)) + raises(ValueError, lambda: Heaviside(2 + 3*I)) + + +def test_rewrite(): + x, y = Symbol('x', real=True), Symbol('y') + assert Heaviside(x).rewrite(Piecewise) == ( + Piecewise((0, x < 0), (Heaviside(0), Eq(x, 0)), (1, True))) + assert Heaviside(y).rewrite(Piecewise) == ( + Piecewise((0, y < 0), (Heaviside(0), Eq(y, 0)), (1, True))) + assert Heaviside(x, y).rewrite(Piecewise) == ( + Piecewise((0, x < 0), (y, Eq(x, 0)), (1, True))) + assert Heaviside(x, 0).rewrite(Piecewise) == ( + Piecewise((0, x <= 0), (1, True))) + assert Heaviside(x, 1).rewrite(Piecewise) == ( + Piecewise((0, x < 0), (1, True))) + assert Heaviside(x, nan).rewrite(Piecewise) == ( + Piecewise((0, x < 0), (nan, Eq(x, 0)), (1, True))) + + assert Heaviside(x).rewrite(sign) == \ + Heaviside(x, H0=Heaviside(0)).rewrite(sign) == \ + Piecewise( + (sign(x)/2 + S(1)/2, Eq(Heaviside(0), S(1)/2)), + (Piecewise( + (sign(x)/2 + S(1)/2, Ne(x, 0)), (Heaviside(0), True)), True) + ) + + assert Heaviside(y).rewrite(sign) == Heaviside(y) + assert Heaviside(x, S.Half).rewrite(sign) == (sign(x)+1)/2 + assert Heaviside(x, y).rewrite(sign) == \ + Piecewise( + (sign(x)/2 + S(1)/2, Eq(y, S(1)/2)), + (Piecewise( + (sign(x)/2 + S(1)/2, Ne(x, 0)), (y, True)), True) + ) + + assert DiracDelta(y).rewrite(Piecewise) == Piecewise((DiracDelta(0), Eq(y, 0)), (0, True)) + assert DiracDelta(y, 1).rewrite(Piecewise) == DiracDelta(y, 1) + assert DiracDelta(x - 5).rewrite(Piecewise) == ( + Piecewise((DiracDelta(0), Eq(x - 5, 0)), (0, True))) + + assert (x*DiracDelta(x - 10)).rewrite(SingularityFunction) == x*SingularityFunction(x, 10, -1) + assert 5*x*y*DiracDelta(y, 1).rewrite(SingularityFunction) == 5*x*y*SingularityFunction(y, 0, -2) + assert DiracDelta(0).rewrite(SingularityFunction) == SingularityFunction(0, 0, -1) + assert DiracDelta(0, 1).rewrite(SingularityFunction) == SingularityFunction(0, 0, -2) + + assert Heaviside(x).rewrite(SingularityFunction) == SingularityFunction(x, 0, 0) + assert 5*x*y*Heaviside(y + 1).rewrite(SingularityFunction) == 5*x*y*SingularityFunction(y, -1, 0) + assert ((x - 3)**3*Heaviside(x - 3)).rewrite(SingularityFunction) == (x - 3)**3*SingularityFunction(x, 3, 0) + assert Heaviside(0).rewrite(SingularityFunction) == S.Half diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_elliptic_integrals.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_elliptic_integrals.py new file mode 100644 index 0000000000000000000000000000000000000000..a11e531af32301a00b6fc864064d02f9318929e1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_elliptic_integrals.py @@ -0,0 +1,181 @@ +from sympy.core.numbers import (I, Rational, oo, pi, zoo) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.hyperbolic import atanh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (sin, tan) +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import (hyper, meijerg) +from sympy.integrals.integrals import Integral +from sympy.series.order import O +from sympy.functions.special.elliptic_integrals import (elliptic_k as K, + elliptic_f as F, elliptic_e as E, elliptic_pi as P) +from sympy.core.random import (test_derivative_numerically as td, + random_complex_number as randcplx, + verify_numerically as tn) +from sympy.abc import z, m, n + +i = Symbol('i', integer=True) +j = Symbol('k', integer=True, positive=True) +t = Dummy('t') + +def test_K(): + assert K(0) == pi/2 + assert K(S.Half) == 8*pi**Rational(3, 2)/gamma(Rational(-1, 4))**2 + assert K(1) is zoo + assert K(-1) == gamma(Rational(1, 4))**2/(4*sqrt(2*pi)) + assert K(oo) == 0 + assert K(-oo) == 0 + assert K(I*oo) == 0 + assert K(-I*oo) == 0 + assert K(zoo) == 0 + + assert K(z).diff(z) == (E(z) - (1 - z)*K(z))/(2*z*(1 - z)) + assert td(K(z), z) + + zi = Symbol('z', real=False) + assert K(zi).conjugate() == K(zi.conjugate()) + zr = Symbol('z', negative=True) + assert K(zr).conjugate() == K(zr) + + assert K(z).rewrite(hyper) == \ + (pi/2)*hyper((S.Half, S.Half), (S.One,), z) + assert tn(K(z), (pi/2)*hyper((S.Half, S.Half), (S.One,), z)) + assert K(z).rewrite(meijerg) == \ + meijerg(((S.Half, S.Half), []), ((S.Zero,), (S.Zero,)), -z)/2 + assert tn(K(z), meijerg(((S.Half, S.Half), []), ((S.Zero,), (S.Zero,)), -z)/2) + + assert K(z).series(z) == pi/2 + pi*z/8 + 9*pi*z**2/128 + \ + 25*pi*z**3/512 + 1225*pi*z**4/32768 + 3969*pi*z**5/131072 + O(z**6) + + assert K(m).rewrite(Integral).dummy_eq( + Integral(1/sqrt(1 - m*sin(t)**2), (t, 0, pi/2))) + +def test_F(): + assert F(z, 0) == z + assert F(0, m) == 0 + assert F(pi*i/2, m) == i*K(m) + assert F(z, oo) == 0 + assert F(z, -oo) == 0 + + assert F(-z, m) == -F(z, m) + + assert F(z, m).diff(z) == 1/sqrt(1 - m*sin(z)**2) + assert F(z, m).diff(m) == E(z, m)/(2*m*(1 - m)) - F(z, m)/(2*m) - \ + sin(2*z)/(4*(1 - m)*sqrt(1 - m*sin(z)**2)) + r = randcplx() + assert td(F(z, r), z) + assert td(F(r, m), m) + + mi = Symbol('m', real=False) + assert F(z, mi).conjugate() == F(z.conjugate(), mi.conjugate()) + mr = Symbol('m', negative=True) + assert F(z, mr).conjugate() == F(z.conjugate(), mr) + + assert F(z, m).series(z) == \ + z + z**5*(3*m**2/40 - m/30) + m*z**3/6 + O(z**6) + + assert F(z, m).rewrite(Integral).dummy_eq( + Integral(1/sqrt(1 - m*sin(t)**2), (t, 0, z))) + +def test_E(): + assert E(z, 0) == z + assert E(0, m) == 0 + assert E(i*pi/2, m) == i*E(m) + assert E(z, oo) is zoo + assert E(z, -oo) is zoo + assert E(0) == pi/2 + assert E(1) == 1 + assert E(oo) == I*oo + assert E(-oo) is oo + assert E(zoo) is zoo + + assert E(-z, m) == -E(z, m) + + assert E(z, m).diff(z) == sqrt(1 - m*sin(z)**2) + assert E(z, m).diff(m) == (E(z, m) - F(z, m))/(2*m) + assert E(z).diff(z) == (E(z) - K(z))/(2*z) + r = randcplx() + assert td(E(r, m), m) + assert td(E(z, r), z) + assert td(E(z), z) + + mi = Symbol('m', real=False) + assert E(z, mi).conjugate() == E(z.conjugate(), mi.conjugate()) + assert E(mi).conjugate() == E(mi.conjugate()) + mr = Symbol('m', negative=True) + assert E(z, mr).conjugate() == E(z.conjugate(), mr) + assert E(mr).conjugate() == E(mr) + + assert E(z).rewrite(hyper) == (pi/2)*hyper((Rational(-1, 2), S.Half), (S.One,), z) + assert tn(E(z), (pi/2)*hyper((Rational(-1, 2), S.Half), (S.One,), z)) + assert E(z).rewrite(meijerg) == \ + -meijerg(((S.Half, Rational(3, 2)), []), ((S.Zero,), (S.Zero,)), -z)/4 + assert tn(E(z), -meijerg(((S.Half, Rational(3, 2)), []), ((S.Zero,), (S.Zero,)), -z)/4) + + assert E(z, m).series(z) == \ + z + z**5*(-m**2/40 + m/30) - m*z**3/6 + O(z**6) + assert E(z).series(z) == pi/2 - pi*z/8 - 3*pi*z**2/128 - \ + 5*pi*z**3/512 - 175*pi*z**4/32768 - 441*pi*z**5/131072 + O(z**6) + assert E(4*z/(z+1)).series(z) == \ + pi/2 - pi*z/2 + pi*z**2/8 - 3*pi*z**3/8 - 15*pi*z**4/128 - 93*pi*z**5/128 + O(z**6) + + assert E(z, m).rewrite(Integral).dummy_eq( + Integral(sqrt(1 - m*sin(t)**2), (t, 0, z))) + assert E(m).rewrite(Integral).dummy_eq( + Integral(sqrt(1 - m*sin(t)**2), (t, 0, pi/2))) + +def test_P(): + assert P(0, z, m) == F(z, m) + assert P(1, z, m) == F(z, m) + \ + (sqrt(1 - m*sin(z)**2)*tan(z) - E(z, m))/(1 - m) + assert P(n, i*pi/2, m) == i*P(n, m) + assert P(n, z, 0) == atanh(sqrt(n - 1)*tan(z))/sqrt(n - 1) + assert P(n, z, n) == F(z, n) - P(1, z, n) + tan(z)/sqrt(1 - n*sin(z)**2) + assert P(oo, z, m) == 0 + assert P(-oo, z, m) == 0 + assert P(n, z, oo) == 0 + assert P(n, z, -oo) == 0 + assert P(0, m) == K(m) + assert P(1, m) is zoo + assert P(n, 0) == pi/(2*sqrt(1 - n)) + assert P(2, 1) is -oo + assert P(-1, 1) is oo + assert P(n, n) == E(n)/(1 - n) + + assert P(n, -z, m) == -P(n, z, m) + + ni, mi = Symbol('n', real=False), Symbol('m', real=False) + assert P(ni, z, mi).conjugate() == \ + P(ni.conjugate(), z.conjugate(), mi.conjugate()) + nr, mr = Symbol('n', negative=True), \ + Symbol('m', negative=True) + assert P(nr, z, mr).conjugate() == P(nr, z.conjugate(), mr) + assert P(n, m).conjugate() == P(n.conjugate(), m.conjugate()) + + assert P(n, z, m).diff(n) == (E(z, m) + (m - n)*F(z, m)/n + + (n**2 - m)*P(n, z, m)/n - n*sqrt(1 - + m*sin(z)**2)*sin(2*z)/(2*(1 - n*sin(z)**2)))/(2*(m - n)*(n - 1)) + assert P(n, z, m).diff(z) == 1/(sqrt(1 - m*sin(z)**2)*(1 - n*sin(z)**2)) + assert P(n, z, m).diff(m) == (E(z, m)/(m - 1) + P(n, z, m) - + m*sin(2*z)/(2*(m - 1)*sqrt(1 - m*sin(z)**2)))/(2*(n - m)) + assert P(n, m).diff(n) == (E(m) + (m - n)*K(m)/n + + (n**2 - m)*P(n, m)/n)/(2*(m - n)*(n - 1)) + assert P(n, m).diff(m) == (E(m)/(m - 1) + P(n, m))/(2*(n - m)) + + # These tests fail due to + # https://github.com/fredrik-johansson/mpmath/issues/571#issuecomment-777201962 + # https://github.com/sympy/sympy/issues/20933#issuecomment-777080385 + # + # rx, ry = randcplx(), randcplx() + # assert td(P(n, rx, ry), n) + # assert td(P(rx, z, ry), z) + # assert td(P(rx, ry, m), m) + + assert P(n, z, m).series(z) == z + z**3*(m/6 + n/3) + \ + z**5*(3*m**2/40 + m*n/10 - m/30 + n**2/5 - n/15) + O(z**6) + + assert P(n, z, m).rewrite(Integral).dummy_eq( + Integral(1/((1 - n*sin(t)**2)*sqrt(1 - m*sin(t)**2)), (t, 0, z))) + assert P(n, m).rewrite(Integral).dummy_eq( + Integral(1/((1 - n*sin(t)**2)*sqrt(1 - m*sin(t)**2)), (t, 0, pi/2))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_error_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_error_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..073371d3d584b97936729dc2e39c833ac347559b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_error_functions.py @@ -0,0 +1,860 @@ +from sympy.core.function import (diff, expand, expand_func) +from sympy.core import EulerGamma +from sympy.core.numbers import (E, Float, I, Rational, nan, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols, Dummy) +from sympy.functions.elementary.complexes import (conjugate, im, polar_lift, re) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import (cosh, sinh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin, sinc) +from sympy.functions.special.error_functions import (Chi, Ci, E1, Ei, Li, Shi, Si, erf, erf2, erf2inv, erfc, erfcinv, erfi, erfinv, expint, fresnelc, fresnels, li) +from sympy.functions.special.gamma_functions import (gamma, uppergamma) +from sympy.functions.special.hyper import (hyper, meijerg) +from sympy.integrals.integrals import (Integral, integrate) +from sympy.series.gruntz import gruntz +from sympy.series.limits import limit +from sympy.series.order import O +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.functions.special.error_functions import _erfs, _eis +from sympy.testing.pytest import raises + +x, y, z = symbols('x,y,z') +w = Symbol("w", real=True) +n = Symbol("n", integer=True) +t = Dummy('t') + + +def test_erf(): + assert erf(nan) is nan + + assert erf(oo) == 1 + assert erf(-oo) == -1 + + assert erf(0) is S.Zero + + assert erf(I*oo) == oo*I + assert erf(-I*oo) == -oo*I + + assert erf(-2) == -erf(2) + assert erf(-x*y) == -erf(x*y) + assert erf(-x - y) == -erf(x + y) + + assert erf(erfinv(x)) == x + assert erf(erfcinv(x)) == 1 - x + assert erf(erf2inv(0, x)) == x + assert erf(erf2inv(0, x, evaluate=False)) == x # To cover code in erf + assert erf(erf2inv(0, erf(erfcinv(1 - erf(erfinv(x)))))) == x + + alpha = symbols('alpha', extended_real=True) + assert erf(alpha).is_real is True + assert erf(alpha).is_finite is True + alpha = symbols('alpha', extended_real=False) + assert erf(alpha).is_real is None + assert erf(alpha).is_finite is None + assert erf(alpha).is_zero is None + assert erf(alpha).is_positive is None + assert erf(alpha).is_negative is None + alpha = symbols('alpha', extended_positive=True) + assert erf(alpha).is_positive is True + alpha = symbols('alpha', extended_negative=True) + assert erf(alpha).is_negative is True + assert erf(I).is_real is False + assert erf(0, evaluate=False).is_real + assert erf(0, evaluate=False).is_zero + + assert conjugate(erf(z)) == erf(conjugate(z)) + + assert erf(x).as_leading_term(x) == 2*x/sqrt(pi) + assert erf(x*y).as_leading_term(y) == 2*x*y/sqrt(pi) + assert (erf(x*y)/erf(y)).as_leading_term(y) == x + assert erf(1/x).as_leading_term(x) == S.One + + assert erf(z).rewrite('uppergamma') == sqrt(z**2)*(1 - erfc(sqrt(z**2)))/z + assert erf(z).rewrite('erfc') == S.One - erfc(z) + assert erf(z).rewrite('erfi') == -I*erfi(I*z) + assert erf(z).rewrite('fresnels') == (1 + I)*(fresnelc(z*(1 - I)/sqrt(pi)) - + I*fresnels(z*(1 - I)/sqrt(pi))) + assert erf(z).rewrite('fresnelc') == (1 + I)*(fresnelc(z*(1 - I)/sqrt(pi)) - + I*fresnels(z*(1 - I)/sqrt(pi))) + assert erf(z).rewrite('hyper') == 2*z*hyper([S.Half], [3*S.Half], -z**2)/sqrt(pi) + assert erf(z).rewrite('meijerg') == z*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2)/sqrt(pi) + assert erf(z).rewrite('expint') == sqrt(z**2)/z - z*expint(S.Half, z**2)/sqrt(S.Pi) + + assert limit(exp(x)*exp(x**2)*(erf(x + 1/exp(x)) - erf(x)), x, oo) == \ + 2/sqrt(pi) + assert limit((1 - erf(z))*exp(z**2)*z, z, oo) == 1/sqrt(pi) + assert limit((1 - erf(x))*exp(x**2)*sqrt(pi)*x, x, oo) == 1 + assert limit(((1 - erf(x))*exp(x**2)*sqrt(pi)*x - 1)*2*x**2, x, oo) == -1 + assert limit(erf(x)/x, x, 0) == 2/sqrt(pi) + assert limit(x**(-4) - sqrt(pi)*erf(x**2) / (2*x**6), x, 0) == S(1)/3 + + assert erf(x).as_real_imag() == \ + (erf(re(x) - I*im(x))/2 + erf(re(x) + I*im(x))/2, + -I*(-erf(re(x) - I*im(x)) + erf(re(x) + I*im(x)))/2) + + assert erf(x).as_real_imag(deep=False) == \ + (erf(re(x) - I*im(x))/2 + erf(re(x) + I*im(x))/2, + -I*(-erf(re(x) - I*im(x)) + erf(re(x) + I*im(x)))/2) + + assert erf(w).as_real_imag() == (erf(w), 0) + assert erf(w).as_real_imag(deep=False) == (erf(w), 0) + # issue 13575 + assert erf(I).as_real_imag() == (0, -I*erf(I)) + + raises(ArgumentIndexError, lambda: erf(x).fdiff(2)) + + assert erf(x).inverse() == erfinv + + +def test_erf_series(): + assert erf(x).series(x, 0, 7) == 2*x/sqrt(pi) - \ + 2*x**3/3/sqrt(pi) + x**5/5/sqrt(pi) + O(x**7) + + assert erf(x).series(x, oo) == \ + -exp(-x**2)*(3/(4*x**5) - 1/(2*x**3) + 1/x + O(x**(-6), (x, oo)))/sqrt(pi) + 1 + assert erf(x**2).series(x, oo, n=8) == \ + (-1/(2*x**6) + x**(-2) + O(x**(-8), (x, oo)))*exp(-x**4)/sqrt(pi)*-1 + 1 + assert erf(sqrt(x)).series(x, oo, n=3) == (sqrt(1/x) - (1/x)**(S(3)/2)/2\ + + 3*(1/x)**(S(5)/2)/4 + O(x**(-3), (x, oo)))*exp(-x)/sqrt(pi)*-1 + 1 + + +def test_erf_evalf(): + assert abs( erf(Float(2.0)) - 0.995322265 ) < 1E-8 # XXX + + +def test__erfs(): + assert _erfs(z).diff(z) == -2/sqrt(S.Pi) + 2*z*_erfs(z) + + assert _erfs(1/z).series(z) == \ + z/sqrt(pi) - z**3/(2*sqrt(pi)) + 3*z**5/(4*sqrt(pi)) + O(z**6) + + assert expand(erf(z).rewrite('tractable').diff(z).rewrite('intractable')) \ + == erf(z).diff(z) + assert _erfs(z).rewrite("intractable") == (-erf(z) + 1)*exp(z**2) + raises(ArgumentIndexError, lambda: _erfs(z).fdiff(2)) + + +def test_erfc(): + assert erfc(nan) is nan + + assert erfc(oo) is S.Zero + assert erfc(-oo) == 2 + + assert erfc(0) == 1 + + assert erfc(I*oo) == -oo*I + assert erfc(-I*oo) == oo*I + + assert erfc(-x) == S(2) - erfc(x) + assert erfc(erfcinv(x)) == x + + alpha = symbols('alpha', extended_real=True) + assert erfc(alpha).is_real is True + alpha = symbols('alpha', extended_real=False) + assert erfc(alpha).is_real is None + assert erfc(I).is_real is False + assert erfc(0, evaluate=False).is_real + assert erfc(0, evaluate=False).is_zero is False + + assert erfc(erfinv(x)) == 1 - x + + assert conjugate(erfc(z)) == erfc(conjugate(z)) + + assert erfc(x).as_leading_term(x) is S.One + assert erfc(1/x).as_leading_term(x) == S.Zero + + assert erfc(z).rewrite('erf') == 1 - erf(z) + assert erfc(z).rewrite('erfi') == 1 + I*erfi(I*z) + assert erfc(z).rewrite('fresnels') == 1 - (1 + I)*(fresnelc(z*(1 - I)/sqrt(pi)) - + I*fresnels(z*(1 - I)/sqrt(pi))) + assert erfc(z).rewrite('fresnelc') == 1 - (1 + I)*(fresnelc(z*(1 - I)/sqrt(pi)) - + I*fresnels(z*(1 - I)/sqrt(pi))) + assert erfc(z).rewrite('hyper') == 1 - 2*z*hyper([S.Half], [3*S.Half], -z**2)/sqrt(pi) + assert erfc(z).rewrite('meijerg') == 1 - z*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2)/sqrt(pi) + assert erfc(z).rewrite('uppergamma') == 1 - sqrt(z**2)*(1 - erfc(sqrt(z**2)))/z + assert erfc(z).rewrite('expint') == S.One - sqrt(z**2)/z + z*expint(S.Half, z**2)/sqrt(S.Pi) + assert erfc(z).rewrite('tractable') == _erfs(z)*exp(-z**2) + assert expand_func(erf(x) + erfc(x)) is S.One + + assert erfc(x).as_real_imag() == \ + (erfc(re(x) - I*im(x))/2 + erfc(re(x) + I*im(x))/2, + -I*(-erfc(re(x) - I*im(x)) + erfc(re(x) + I*im(x)))/2) + + assert erfc(x).as_real_imag(deep=False) == \ + (erfc(re(x) - I*im(x))/2 + erfc(re(x) + I*im(x))/2, + -I*(-erfc(re(x) - I*im(x)) + erfc(re(x) + I*im(x)))/2) + + assert erfc(w).as_real_imag() == (erfc(w), 0) + assert erfc(w).as_real_imag(deep=False) == (erfc(w), 0) + raises(ArgumentIndexError, lambda: erfc(x).fdiff(2)) + + assert erfc(x).inverse() == erfcinv + + +def test_erfc_series(): + assert erfc(x).series(x, 0, 7) == 1 - 2*x/sqrt(pi) + \ + 2*x**3/3/sqrt(pi) - x**5/5/sqrt(pi) + O(x**7) + + assert erfc(x).series(x, oo) == \ + (3/(4*x**5) - 1/(2*x**3) + 1/x + O(x**(-6), (x, oo)))*exp(-x**2)/sqrt(pi) + + +def test_erfc_evalf(): + assert abs( erfc(Float(2.0)) - 0.00467773 ) < 1E-8 # XXX + + +def test_erfi(): + assert erfi(nan) is nan + + assert erfi(oo) is S.Infinity + assert erfi(-oo) is S.NegativeInfinity + + assert erfi(0) is S.Zero + + assert erfi(I*oo) == I + assert erfi(-I*oo) == -I + + assert erfi(-x) == -erfi(x) + + assert erfi(I*erfinv(x)) == I*x + assert erfi(I*erfcinv(x)) == I*(1 - x) + assert erfi(I*erf2inv(0, x)) == I*x + assert erfi(I*erf2inv(0, x, evaluate=False)) == I*x # To cover code in erfi + + assert erfi(I).is_real is False + assert erfi(0, evaluate=False).is_real + assert erfi(0, evaluate=False).is_zero + + assert conjugate(erfi(z)) == erfi(conjugate(z)) + + assert erfi(x).as_leading_term(x) == 2*x/sqrt(pi) + assert erfi(x*y).as_leading_term(y) == 2*x*y/sqrt(pi) + assert (erfi(x*y)/erfi(y)).as_leading_term(y) == x + assert erfi(1/x).as_leading_term(x) == erfi(1/x) + + assert erfi(z).rewrite('erf') == -I*erf(I*z) + assert erfi(z).rewrite('erfc') == I*erfc(I*z) - I + assert erfi(z).rewrite('fresnels') == (1 - I)*(fresnelc(z*(1 + I)/sqrt(pi)) - + I*fresnels(z*(1 + I)/sqrt(pi))) + assert erfi(z).rewrite('fresnelc') == (1 - I)*(fresnelc(z*(1 + I)/sqrt(pi)) - + I*fresnels(z*(1 + I)/sqrt(pi))) + assert erfi(z).rewrite('hyper') == 2*z*hyper([S.Half], [3*S.Half], z**2)/sqrt(pi) + assert erfi(z).rewrite('meijerg') == z*meijerg([S.Half], [], [0], [Rational(-1, 2)], -z**2)/sqrt(pi) + assert erfi(z).rewrite('uppergamma') == (sqrt(-z**2)/z*(uppergamma(S.Half, + -z**2)/sqrt(S.Pi) - S.One)) + assert erfi(z).rewrite('expint') == sqrt(-z**2)/z - z*expint(S.Half, -z**2)/sqrt(S.Pi) + assert erfi(z).rewrite('tractable') == -I*(-_erfs(I*z)*exp(z**2) + 1) + assert expand_func(erfi(I*z)) == I*erf(z) + + assert erfi(x).as_real_imag() == \ + (erfi(re(x) - I*im(x))/2 + erfi(re(x) + I*im(x))/2, + -I*(-erfi(re(x) - I*im(x)) + erfi(re(x) + I*im(x)))/2) + assert erfi(x).as_real_imag(deep=False) == \ + (erfi(re(x) - I*im(x))/2 + erfi(re(x) + I*im(x))/2, + -I*(-erfi(re(x) - I*im(x)) + erfi(re(x) + I*im(x)))/2) + + assert erfi(w).as_real_imag() == (erfi(w), 0) + assert erfi(w).as_real_imag(deep=False) == (erfi(w), 0) + + raises(ArgumentIndexError, lambda: erfi(x).fdiff(2)) + + +def test_erfi_series(): + assert erfi(x).series(x, 0, 7) == 2*x/sqrt(pi) + \ + 2*x**3/3/sqrt(pi) + x**5/5/sqrt(pi) + O(x**7) + + assert erfi(x).series(x, oo) == \ + (3/(4*x**5) + 1/(2*x**3) + 1/x + O(x**(-6), (x, oo)))*exp(x**2)/sqrt(pi) - I + + +def test_erfi_evalf(): + assert abs( erfi(Float(2.0)) - 18.5648024145756 ) < 1E-13 # XXX + + +def test_erf2(): + + assert erf2(0, 0) is S.Zero + assert erf2(x, x) is S.Zero + assert erf2(nan, 0) is nan + + assert erf2(-oo, y) == erf(y) + 1 + assert erf2( oo, y) == erf(y) - 1 + assert erf2( x, oo) == 1 - erf(x) + assert erf2( x,-oo) == -1 - erf(x) + assert erf2(x, erf2inv(x, y)) == y + + assert erf2(-x, -y) == -erf2(x,y) + assert erf2(-x, y) == erf(y) + erf(x) + assert erf2( x, -y) == -erf(y) - erf(x) + assert erf2(x, y).rewrite('fresnels') == erf(y).rewrite(fresnels)-erf(x).rewrite(fresnels) + assert erf2(x, y).rewrite('fresnelc') == erf(y).rewrite(fresnelc)-erf(x).rewrite(fresnelc) + assert erf2(x, y).rewrite('hyper') == erf(y).rewrite(hyper)-erf(x).rewrite(hyper) + assert erf2(x, y).rewrite('meijerg') == erf(y).rewrite(meijerg)-erf(x).rewrite(meijerg) + assert erf2(x, y).rewrite('uppergamma') == erf(y).rewrite(uppergamma) - erf(x).rewrite(uppergamma) + assert erf2(x, y).rewrite('expint') == erf(y).rewrite(expint)-erf(x).rewrite(expint) + + assert erf2(I, 0).is_real is False + assert erf2(0, 0, evaluate=False).is_real + assert erf2(0, 0, evaluate=False).is_zero + assert erf2(x, x, evaluate=False).is_zero + assert erf2(x, y).is_zero is None + + assert expand_func(erf(x) + erf2(x, y)) == erf(y) + + assert conjugate(erf2(x, y)) == erf2(conjugate(x), conjugate(y)) + + assert erf2(x, y).rewrite('erf') == erf(y) - erf(x) + assert erf2(x, y).rewrite('erfc') == erfc(x) - erfc(y) + assert erf2(x, y).rewrite('erfi') == I*(erfi(I*x) - erfi(I*y)) + + assert erf2(x, y).diff(x) == erf2(x, y).fdiff(1) + assert erf2(x, y).diff(y) == erf2(x, y).fdiff(2) + assert erf2(x, y).diff(x) == -2*exp(-x**2)/sqrt(pi) + assert erf2(x, y).diff(y) == 2*exp(-y**2)/sqrt(pi) + raises(ArgumentIndexError, lambda: erf2(x, y).fdiff(3)) + + assert erf2(x, y).is_extended_real is None + xr, yr = symbols('xr yr', extended_real=True) + assert erf2(xr, yr).is_extended_real is True + + +def test_erfinv(): + assert erfinv(0) is S.Zero + assert erfinv(1) is S.Infinity + assert erfinv(nan) is S.NaN + assert erfinv(-1) is S.NegativeInfinity + + assert erfinv(erf(w)) == w + assert erfinv(erf(-w)) == -w + + assert erfinv(x).diff() == sqrt(pi)*exp(erfinv(x)**2)/2 + raises(ArgumentIndexError, lambda: erfinv(x).fdiff(2)) + + assert erfinv(z).rewrite('erfcinv') == erfcinv(1-z) + assert erfinv(z).inverse() == erf + + +def test_erfinv_evalf(): + assert abs( erfinv(Float(0.2)) - 0.179143454621292 ) < 1E-13 + + +def test_erfcinv(): + assert erfcinv(1) is S.Zero + assert erfcinv(0) is S.Infinity + assert erfcinv(0, evaluate=False).is_infinite is True + assert erfcinv(2, evaluate=False).is_infinite is True + assert erfcinv(nan) is S.NaN + + assert erfcinv(x).diff() == -sqrt(pi)*exp(erfcinv(x)**2)/2 + raises(ArgumentIndexError, lambda: erfcinv(x).fdiff(2)) + + assert erfcinv(z).rewrite('erfinv') == erfinv(1-z) + assert erfcinv(z).inverse() == erfc + + +def test_erf2inv(): + assert erf2inv(0, 0) is S.Zero + assert erf2inv(0, 1) is S.Infinity + assert erf2inv(1, 0) is S.One + assert erf2inv(0, y) == erfinv(y) + assert erf2inv(oo, y) == erfcinv(-y) + assert erf2inv(x, 0) == x + assert erf2inv(x, oo) == erfinv(x) + assert erf2inv(nan, 0) is nan + assert erf2inv(0, nan) is nan + + assert erf2inv(x, y).diff(x) == exp(-x**2 + erf2inv(x, y)**2) + assert erf2inv(x, y).diff(y) == sqrt(pi)*exp(erf2inv(x, y)**2)/2 + raises(ArgumentIndexError, lambda: erf2inv(x, y).fdiff(3)) + + +# NOTE we multiply by exp_polar(I*pi) and need this to be on the principal +# branch, hence take x in the lower half plane (d=0). + + +def mytn(expr1, expr2, expr3, x, d=0): + from sympy.core.random import verify_numerically, random_complex_number + subs = {} + for a in expr1.free_symbols: + if a != x: + subs[a] = random_complex_number() + return expr2 == expr3 and verify_numerically(expr1.subs(subs), + expr2.subs(subs), x, d=d) + + +def mytd(expr1, expr2, x): + from sympy.core.random import test_derivative_numerically, \ + random_complex_number + subs = {} + for a in expr1.free_symbols: + if a != x: + subs[a] = random_complex_number() + return expr1.diff(x) == expr2 and test_derivative_numerically(expr1.subs(subs), x) + + +def tn_branch(func, s=None): + from sympy.core.random import uniform + + def fn(x): + if s is None: + return func(x) + return func(s, x) + c = uniform(1, 5) + expr = fn(c*exp_polar(I*pi)) - fn(c*exp_polar(-I*pi)) + eps = 1e-15 + expr2 = fn(-c + eps*I) - fn(-c - eps*I) + return abs(expr.n() - expr2.n()).n() < 1e-10 + + +def test_ei(): + assert Ei(0) is S.NegativeInfinity + assert Ei(oo) is S.Infinity + assert Ei(-oo) is S.Zero + + assert tn_branch(Ei) + assert mytd(Ei(x), exp(x)/x, x) + assert mytn(Ei(x), Ei(x).rewrite(uppergamma), + -uppergamma(0, x*polar_lift(-1)) - I*pi, x) + assert mytn(Ei(x), Ei(x).rewrite(expint), + -expint(1, x*polar_lift(-1)) - I*pi, x) + assert Ei(x).rewrite(expint).rewrite(Ei) == Ei(x) + assert Ei(x*exp_polar(2*I*pi)) == Ei(x) + 2*I*pi + assert Ei(x*exp_polar(-2*I*pi)) == Ei(x) - 2*I*pi + + assert mytn(Ei(x), Ei(x).rewrite(Shi), Chi(x) + Shi(x), x) + assert mytn(Ei(x*polar_lift(I)), Ei(x*polar_lift(I)).rewrite(Si), + Ci(x) + I*Si(x) + I*pi/2, x) + + assert Ei(log(x)).rewrite(li) == li(x) + assert Ei(2*log(x)).rewrite(li) == li(x**2) + + assert gruntz(Ei(x+exp(-x))*exp(-x)*x, x, oo) == 1 + + assert Ei(x).series(x) == EulerGamma + log(x) + x + x**2/4 + \ + x**3/18 + x**4/96 + x**5/600 + O(x**6) + assert Ei(x).series(x, 1, 3) == Ei(1) + E*(x - 1) + O((x - 1)**3, (x, 1)) + assert Ei(x).series(x, oo) == \ + (120/x**5 + 24/x**4 + 6/x**3 + 2/x**2 + 1/x + 1 + O(x**(-6), (x, oo)))*exp(x)/x + assert Ei(x).series(x, -oo) == \ + (120/x**5 + 24/x**4 + 6/x**3 + 2/x**2 + 1/x + 1 + O(x**(-6), (x, -oo)))*exp(x)/x + assert Ei(-x).series(x, oo) == \ + -((-120/x**5 + 24/x**4 - 6/x**3 + 2/x**2 - 1/x + 1 + O(x**(-6), (x, oo)))*exp(-x)/x) + + assert str(Ei(cos(2)).evalf(n=10)) == '-0.6760647401' + raises(ArgumentIndexError, lambda: Ei(x).fdiff(2)) + + +def test_expint(): + assert mytn(expint(x, y), expint(x, y).rewrite(uppergamma), + y**(x - 1)*uppergamma(1 - x, y), x) + assert mytd( + expint(x, y), -y**(x - 1)*meijerg([], [1, 1], [0, 0, 1 - x], [], y), x) + assert mytd(expint(x, y), -expint(x - 1, y), y) + assert mytn(expint(1, x), expint(1, x).rewrite(Ei), + -Ei(x*polar_lift(-1)) + I*pi, x) + + assert expint(-4, x) == exp(-x)/x + 4*exp(-x)/x**2 + 12*exp(-x)/x**3 \ + + 24*exp(-x)/x**4 + 24*exp(-x)/x**5 + assert expint(Rational(-3, 2), x) == \ + exp(-x)/x + 3*exp(-x)/(2*x**2) + 3*sqrt(pi)*erfc(sqrt(x))/(4*x**S('5/2')) + + assert tn_branch(expint, 1) + assert tn_branch(expint, 2) + assert tn_branch(expint, 3) + assert tn_branch(expint, 1.7) + assert tn_branch(expint, pi) + + assert expint(y, x*exp_polar(2*I*pi)) == \ + x**(y - 1)*(exp(2*I*pi*y) - 1)*gamma(-y + 1) + expint(y, x) + assert expint(y, x*exp_polar(-2*I*pi)) == \ + x**(y - 1)*(exp(-2*I*pi*y) - 1)*gamma(-y + 1) + expint(y, x) + assert expint(2, x*exp_polar(2*I*pi)) == 2*I*pi*x + expint(2, x) + assert expint(2, x*exp_polar(-2*I*pi)) == -2*I*pi*x + expint(2, x) + assert expint(1, x).rewrite(Ei).rewrite(expint) == expint(1, x) + assert expint(x, y).rewrite(Ei) == expint(x, y) + assert expint(x, y).rewrite(Ci) == expint(x, y) + + assert mytn(E1(x), E1(x).rewrite(Shi), Shi(x) - Chi(x), x) + assert mytn(E1(polar_lift(I)*x), E1(polar_lift(I)*x).rewrite(Si), + -Ci(x) + I*Si(x) - I*pi/2, x) + + assert mytn(expint(2, x), expint(2, x).rewrite(Ei).rewrite(expint), + -x*E1(x) + exp(-x), x) + assert mytn(expint(3, x), expint(3, x).rewrite(Ei).rewrite(expint), + x**2*E1(x)/2 + (1 - x)*exp(-x)/2, x) + + assert expint(Rational(3, 2), z).nseries(z) == \ + 2 + 2*z - z**2/3 + z**3/15 - z**4/84 + z**5/540 - \ + 2*sqrt(pi)*sqrt(z) + O(z**6) + + assert E1(z).series(z) == -EulerGamma - log(z) + z - \ + z**2/4 + z**3/18 - z**4/96 + z**5/600 + O(z**6) + + assert expint(4, z).series(z) == Rational(1, 3) - z/2 + z**2/2 + \ + z**3*(log(z)/6 - Rational(11, 36) + EulerGamma/6 - I*pi/6) - z**4/24 + \ + z**5/240 + O(z**6) + + assert expint(n, x).series(x, oo, n=3) == \ + (n*(n + 1)/x**2 - n/x + 1 + O(x**(-3), (x, oo)))*exp(-x)/x + + assert expint(z, y).series(z, 0, 2) == exp(-y)/y - z*meijerg(((), (1, 1)), + ((0, 0, 1), ()), y)/y + O(z**2) + raises(ArgumentIndexError, lambda: expint(x, y).fdiff(3)) + + neg = Symbol('neg', negative=True) + assert Ei(neg).rewrite(Si) == Shi(neg) + Chi(neg) - I*pi + + +def test__eis(): + assert _eis(z).diff(z) == -_eis(z) + 1/z + + assert _eis(1/z).series(z) == \ + z + z**2 + 2*z**3 + 6*z**4 + 24*z**5 + O(z**6) + + assert Ei(z).rewrite('tractable') == exp(z)*_eis(z) + assert li(z).rewrite('tractable') == z*_eis(log(z)) + + assert _eis(z).rewrite('intractable') == exp(-z)*Ei(z) + + assert expand(li(z).rewrite('tractable').diff(z).rewrite('intractable')) \ + == li(z).diff(z) + + assert expand(Ei(z).rewrite('tractable').diff(z).rewrite('intractable')) \ + == Ei(z).diff(z) + + assert _eis(z).series(z, n=3) == EulerGamma + log(z) + z*(-log(z) - \ + EulerGamma + 1) + z**2*(log(z)/2 - Rational(3, 4) + EulerGamma/2)\ + + O(z**3*log(z)) + raises(ArgumentIndexError, lambda: _eis(z).fdiff(2)) + + +def tn_arg(func): + def test(arg, e1, e2): + from sympy.core.random import uniform + v = uniform(1, 5) + v1 = func(arg*x).subs(x, v).n() + v2 = func(e1*v + e2*1e-15).n() + return abs(v1 - v2).n() < 1e-10 + return test(exp_polar(I*pi/2), I, 1) and \ + test(exp_polar(-I*pi/2), -I, 1) and \ + test(exp_polar(I*pi), -1, I) and \ + test(exp_polar(-I*pi), -1, -I) + + +def test_li(): + z = Symbol("z") + zr = Symbol("z", real=True) + zp = Symbol("z", positive=True) + zn = Symbol("z", negative=True) + + assert li(0) is S.Zero + assert li(1) is -oo + assert li(oo) is oo + + assert isinstance(li(z), li) + assert unchanged(li, -zp) + assert unchanged(li, zn) + + assert diff(li(z), z) == 1/log(z) + + assert conjugate(li(z)) == li(conjugate(z)) + assert conjugate(li(-zr)) == li(-zr) + assert unchanged(conjugate, li(-zp)) + assert unchanged(conjugate, li(zn)) + + assert li(z).rewrite(Li) == Li(z) + li(2) + assert li(z).rewrite(Ei) == Ei(log(z)) + assert li(z).rewrite(uppergamma) == (-log(1/log(z))/2 - log(-log(z)) + + log(log(z))/2 - expint(1, -log(z))) + assert li(z).rewrite(Si) == (-log(I*log(z)) - log(1/log(z))/2 + + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z))) + assert li(z).rewrite(Ci) == (-log(I*log(z)) - log(1/log(z))/2 + + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z))) + assert li(z).rewrite(Shi) == (-log(1/log(z))/2 + log(log(z))/2 + + Chi(log(z)) - Shi(log(z))) + assert li(z).rewrite(Chi) == (-log(1/log(z))/2 + log(log(z))/2 + + Chi(log(z)) - Shi(log(z))) + assert li(z).rewrite(hyper) ==(log(z)*hyper((1, 1), (2, 2), log(z)) - + log(1/log(z))/2 + log(log(z))/2 + EulerGamma) + assert li(z).rewrite(meijerg) == (-log(1/log(z))/2 - log(-log(z)) + log(log(z))/2 - + meijerg(((), (1,)), ((0, 0), ()), -log(z))) + + assert gruntz(1/li(z), z, oo) is S.Zero + assert li(z).series(z) == log(z)**5/600 + log(z)**4/96 + log(z)**3/18 + log(z)**2/4 + \ + log(z) + log(log(z)) + EulerGamma + raises(ArgumentIndexError, lambda: li(z).fdiff(2)) + + +def test_Li(): + assert Li(2) is S.Zero + assert Li(oo) is oo + + assert isinstance(Li(z), Li) + + assert diff(Li(z), z) == 1/log(z) + + assert gruntz(1/Li(z), z, oo) is S.Zero + assert Li(z).rewrite(li) == li(z) - li(2) + assert Li(z).series(z) == \ + log(z)**5/600 + log(z)**4/96 + log(z)**3/18 + log(z)**2/4 + log(z) + log(log(z)) - li(2) + EulerGamma + raises(ArgumentIndexError, lambda: Li(z).fdiff(2)) + + +def test_si(): + assert Si(I*x) == I*Shi(x) + assert Shi(I*x) == I*Si(x) + assert Si(-I*x) == -I*Shi(x) + assert Shi(-I*x) == -I*Si(x) + assert Si(-x) == -Si(x) + assert Shi(-x) == -Shi(x) + assert Si(exp_polar(2*pi*I)*x) == Si(x) + assert Si(exp_polar(-2*pi*I)*x) == Si(x) + assert Shi(exp_polar(2*pi*I)*x) == Shi(x) + assert Shi(exp_polar(-2*pi*I)*x) == Shi(x) + + assert Si(oo) == pi/2 + assert Si(-oo) == -pi/2 + assert Shi(oo) is oo + assert Shi(-oo) is -oo + + assert mytd(Si(x), sin(x)/x, x) + assert mytd(Shi(x), sinh(x)/x, x) + + assert mytn(Si(x), Si(x).rewrite(Ei), + -I*(-Ei(x*exp_polar(-I*pi/2))/2 + + Ei(x*exp_polar(I*pi/2))/2 - I*pi) + pi/2, x) + assert mytn(Si(x), Si(x).rewrite(expint), + -I*(-expint(1, x*exp_polar(-I*pi/2))/2 + + expint(1, x*exp_polar(I*pi/2))/2) + pi/2, x) + assert mytn(Shi(x), Shi(x).rewrite(Ei), + Ei(x)/2 - Ei(x*exp_polar(I*pi))/2 + I*pi/2, x) + assert mytn(Shi(x), Shi(x).rewrite(expint), + expint(1, x)/2 - expint(1, x*exp_polar(I*pi))/2 - I*pi/2, x) + + assert tn_arg(Si) + assert tn_arg(Shi) + + assert Si(x)._eval_as_leading_term(x, None, 1) == x + assert Si(2*x)._eval_as_leading_term(x, None, 1) == 2*x + assert Si(sin(x))._eval_as_leading_term(x, None, 1) == x + assert Si(x + 1)._eval_as_leading_term(x, None, 1) == Si(1) + assert Si(1/x)._eval_as_leading_term(x, None, 1) == \ + Si(1/x)._eval_as_leading_term(x, None, -1) == Si(1/x) + + assert Si(x).nseries(x, n=8) == \ + x - x**3/18 + x**5/600 - x**7/35280 + O(x**8) + assert Shi(x).nseries(x, n=8) == \ + x + x**3/18 + x**5/600 + x**7/35280 + O(x**8) + assert Si(sin(x)).nseries(x, n=5) == x - 2*x**3/9 + O(x**5) + assert Si(x).nseries(x, 1, n=3) == \ + Si(1) + (x - 1)*sin(1) + (x - 1)**2*(-sin(1)/2 + cos(1)/2) + O((x - 1)**3, (x, 1)) + + assert Si(x).series(x, oo) == -sin(x)*(-6/x**4 + x**(-2) + O(x**(-6), (x, oo))) - \ + cos(x)*(24/x**5 - 2/x**3 + 1/x + O(x**(-6), (x, oo))) + pi/2 + + t = Symbol('t', Dummy=True) + assert Si(x).rewrite(sinc).dummy_eq(Integral(sinc(t), (t, 0, x))) + + assert limit(Shi(x), x, S.Infinity) == S.Infinity + assert limit(Shi(x), x, S.NegativeInfinity) == S.NegativeInfinity + + +def test_ci(): + m1 = exp_polar(I*pi) + m1_ = exp_polar(-I*pi) + pI = exp_polar(I*pi/2) + mI = exp_polar(-I*pi/2) + + assert Ci(m1*x) == Ci(x) + I*pi + assert Ci(m1_*x) == Ci(x) - I*pi + assert Ci(pI*x) == Chi(x) + I*pi/2 + assert Ci(mI*x) == Chi(x) - I*pi/2 + assert Chi(m1*x) == Chi(x) + I*pi + assert Chi(m1_*x) == Chi(x) - I*pi + assert Chi(pI*x) == Ci(x) + I*pi/2 + assert Chi(mI*x) == Ci(x) - I*pi/2 + assert Ci(exp_polar(2*I*pi)*x) == Ci(x) + 2*I*pi + assert Chi(exp_polar(-2*I*pi)*x) == Chi(x) - 2*I*pi + assert Chi(exp_polar(2*I*pi)*x) == Chi(x) + 2*I*pi + assert Ci(exp_polar(-2*I*pi)*x) == Ci(x) - 2*I*pi + + assert Ci(oo) is S.Zero + assert Ci(-oo) == I*pi + assert Chi(oo) is oo + assert Chi(-oo) is oo + + assert mytd(Ci(x), cos(x)/x, x) + assert mytd(Chi(x), cosh(x)/x, x) + + assert mytn(Ci(x), Ci(x).rewrite(Ei), + Ei(x*exp_polar(-I*pi/2))/2 + Ei(x*exp_polar(I*pi/2))/2, x) + assert mytn(Chi(x), Chi(x).rewrite(Ei), + Ei(x)/2 + Ei(x*exp_polar(I*pi))/2 - I*pi/2, x) + + assert tn_arg(Ci) + assert tn_arg(Chi) + + assert Ci(x).nseries(x, n=4) == \ + EulerGamma + log(x) - x**2/4 + O(x**4) + assert Chi(x).nseries(x, n=4) == \ + EulerGamma + log(x) + x**2/4 + O(x**4) + + assert Ci(x).series(x, oo) == -cos(x)*(-6/x**4 + x**(-2) + O(x**(-6), (x, oo))) + \ + sin(x)*(24/x**5 - 2/x**3 + 1/x + O(x**(-6), (x, oo))) + + assert Ci(x).series(x, -oo) == -cos(x)*(-6/x**4 + x**(-2) + O(x**(-6), (x, -oo))) + \ + sin(x)*(24/x**5 - 2/x**3 + 1/x + O(x**(-6), (x, -oo))) + I*pi + + assert limit(log(x) - Ci(2*x), x, 0) == -log(2) - EulerGamma + assert Ci(x).rewrite(uppergamma) == -expint(1, x*exp_polar(-I*pi/2))/2 -\ + expint(1, x*exp_polar(I*pi/2))/2 + assert Ci(x).rewrite(expint) == -expint(1, x*exp_polar(-I*pi/2))/2 -\ + expint(1, x*exp_polar(I*pi/2))/2 + raises(ArgumentIndexError, lambda: Ci(x).fdiff(2)) + + +def test_fresnel(): + assert fresnels(0) is S.Zero + assert fresnels(oo) is S.Half + assert fresnels(-oo) == Rational(-1, 2) + assert fresnels(I*oo) == -I*S.Half + + assert unchanged(fresnels, z) + assert fresnels(-z) == -fresnels(z) + assert fresnels(I*z) == -I*fresnels(z) + assert fresnels(-I*z) == I*fresnels(z) + + assert conjugate(fresnels(z)) == fresnels(conjugate(z)) + + assert fresnels(z).diff(z) == sin(pi*z**2/2) + + assert fresnels(z).rewrite(erf) == (S.One + I)/4 * ( + erf((S.One + I)/2*sqrt(pi)*z) - I*erf((S.One - I)/2*sqrt(pi)*z)) + + assert fresnels(z).rewrite(hyper) == \ + pi*z**3/6 * hyper([Rational(3, 4)], [Rational(3, 2), Rational(7, 4)], -pi**2*z**4/16) + + assert fresnels(z).series(z, n=15) == \ + pi*z**3/6 - pi**3*z**7/336 + pi**5*z**11/42240 + O(z**15) + + assert fresnels(w).is_extended_real is True + assert fresnels(w).is_finite is True + + assert fresnels(z).is_extended_real is None + assert fresnels(z).is_finite is None + + assert fresnels(z).as_real_imag() == (fresnels(re(z) - I*im(z))/2 + + fresnels(re(z) + I*im(z))/2, + -I*(-fresnels(re(z) - I*im(z)) + fresnels(re(z) + I*im(z)))/2) + + assert fresnels(z).as_real_imag(deep=False) == (fresnels(re(z) - I*im(z))/2 + + fresnels(re(z) + I*im(z))/2, + -I*(-fresnels(re(z) - I*im(z)) + fresnels(re(z) + I*im(z)))/2) + + assert fresnels(w).as_real_imag() == (fresnels(w), 0) + assert fresnels(w).as_real_imag(deep=True) == (fresnels(w), 0) + + assert fresnels(2 + 3*I).as_real_imag() == ( + fresnels(2 + 3*I)/2 + fresnels(2 - 3*I)/2, + -I*(fresnels(2 + 3*I) - fresnels(2 - 3*I))/2 + ) + + assert expand_func(integrate(fresnels(z), z)) == \ + z*fresnels(z) + cos(pi*z**2/2)/pi + + assert fresnels(z).rewrite(meijerg) == sqrt(2)*pi*z**Rational(9, 4) * \ + meijerg(((), (1,)), ((Rational(3, 4),), + (Rational(1, 4), 0)), -pi**2*z**4/16)/(2*(-z)**Rational(3, 4)*(z**2)**Rational(3, 4)) + + assert fresnelc(0) is S.Zero + assert fresnelc(oo) == S.Half + assert fresnelc(-oo) == Rational(-1, 2) + assert fresnelc(I*oo) == I*S.Half + + assert unchanged(fresnelc, z) + assert fresnelc(-z) == -fresnelc(z) + assert fresnelc(I*z) == I*fresnelc(z) + assert fresnelc(-I*z) == -I*fresnelc(z) + + assert conjugate(fresnelc(z)) == fresnelc(conjugate(z)) + + assert fresnelc(z).diff(z) == cos(pi*z**2/2) + + assert fresnelc(z).rewrite(erf) == (S.One - I)/4 * ( + erf((S.One + I)/2*sqrt(pi)*z) + I*erf((S.One - I)/2*sqrt(pi)*z)) + + assert fresnelc(z).rewrite(hyper) == \ + z * hyper([Rational(1, 4)], [S.Half, Rational(5, 4)], -pi**2*z**4/16) + + assert fresnelc(w).is_extended_real is True + + assert fresnelc(z).as_real_imag() == \ + (fresnelc(re(z) - I*im(z))/2 + fresnelc(re(z) + I*im(z))/2, + -I*(-fresnelc(re(z) - I*im(z)) + fresnelc(re(z) + I*im(z)))/2) + + assert fresnelc(z).as_real_imag(deep=False) == \ + (fresnelc(re(z) - I*im(z))/2 + fresnelc(re(z) + I*im(z))/2, + -I*(-fresnelc(re(z) - I*im(z)) + fresnelc(re(z) + I*im(z)))/2) + + assert fresnelc(2 + 3*I).as_real_imag() == ( + fresnelc(2 - 3*I)/2 + fresnelc(2 + 3*I)/2, + -I*(fresnelc(2 + 3*I) - fresnelc(2 - 3*I))/2 + ) + + assert expand_func(integrate(fresnelc(z), z)) == \ + z*fresnelc(z) - sin(pi*z**2/2)/pi + + assert fresnelc(z).rewrite(meijerg) == sqrt(2)*pi*z**Rational(3, 4) * \ + meijerg(((), (1,)), ((Rational(1, 4),), + (Rational(3, 4), 0)), -pi**2*z**4/16)/(2*(-z)**Rational(1, 4)*(z**2)**Rational(1, 4)) + + from sympy.core.random import verify_numerically + + verify_numerically(re(fresnels(z)), fresnels(z).as_real_imag()[0], z) + verify_numerically(im(fresnels(z)), fresnels(z).as_real_imag()[1], z) + verify_numerically(fresnels(z), fresnels(z).rewrite(hyper), z) + verify_numerically(fresnels(z), fresnels(z).rewrite(meijerg), z) + + verify_numerically(re(fresnelc(z)), fresnelc(z).as_real_imag()[0], z) + verify_numerically(im(fresnelc(z)), fresnelc(z).as_real_imag()[1], z) + verify_numerically(fresnelc(z), fresnelc(z).rewrite(hyper), z) + verify_numerically(fresnelc(z), fresnelc(z).rewrite(meijerg), z) + + raises(ArgumentIndexError, lambda: fresnels(z).fdiff(2)) + raises(ArgumentIndexError, lambda: fresnelc(z).fdiff(2)) + + assert fresnels(x).taylor_term(-1, x) is S.Zero + assert fresnelc(x).taylor_term(-1, x) is S.Zero + assert fresnelc(x).taylor_term(1, x) == -pi**2*x**5/40 + + +def test_fresnel_series(): + assert fresnelc(z).series(z, n=15) == \ + z - pi**2*z**5/40 + pi**4*z**9/3456 - pi**6*z**13/599040 + O(z**15) + + # issues 6510, 10102 + fs = (S.Half - sin(pi*z**2/2)/(pi**2*z**3) + + (-1/(pi*z) + 3/(pi**3*z**5))*cos(pi*z**2/2)) + fc = (S.Half - cos(pi*z**2/2)/(pi**2*z**3) + + (1/(pi*z) - 3/(pi**3*z**5))*sin(pi*z**2/2)) + assert fresnels(z).series(z, oo) == fs + O(z**(-6), (z, oo)) + assert fresnelc(z).series(z, oo) == fc + O(z**(-6), (z, oo)) + assert (fresnels(z).series(z, -oo) + fs.subs(z, -z)).expand().is_Order + assert (fresnelc(z).series(z, -oo) + fc.subs(z, -z)).expand().is_Order + assert (fresnels(1/z).series(z) - fs.subs(z, 1/z)).expand().is_Order + assert (fresnelc(1/z).series(z) - fc.subs(z, 1/z)).expand().is_Order + assert ((2*fresnels(3*z)).series(z, oo) - 2*fs.subs(z, 3*z)).expand().is_Order + assert ((3*fresnelc(2*z)).series(z, oo) - 3*fc.subs(z, 2*z)).expand().is_Order + + +def test_integral_rewrites(): #issues 26134, 26144, 26306 + assert expint(n, x).rewrite(Integral).dummy_eq(Integral(t**-n * exp(-t*x), (t, 1, oo))) + assert Si(x).rewrite(Integral).dummy_eq(Integral(sinc(t), (t, 0, x))) + assert Ci(x).rewrite(Integral).dummy_eq(log(x) - Integral((1 - cos(t))/t, (t, 0, x)) + EulerGamma) + assert fresnels(x).rewrite(Integral).dummy_eq(Integral(sin(pi*t**2/2), (t, 0, x))) + assert fresnelc(x).rewrite(Integral).dummy_eq(Integral(cos(pi*t**2/2), (t, 0, x))) + assert Ei(x).rewrite(Integral).dummy_eq(Integral(exp(t)/t, (t, -oo, x))) + assert fresnels(x).diff(x) == fresnels(x).rewrite(Integral).diff(x) + assert fresnelc(x).diff(x) == fresnelc(x).rewrite(Integral).diff(x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_gamma_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_gamma_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..14c57a31ce2edaa60fd5efc8bcbc95668961fd41 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_gamma_functions.py @@ -0,0 +1,741 @@ +from sympy.core.function import expand_func, Subs +from sympy.core import EulerGamma +from sympy.core.numbers import (I, Rational, nan, oo, pi, zoo) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.combinatorial.numbers import harmonic +from sympy.functions.elementary.complexes import (Abs, conjugate, im, re) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import tanh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin, atan) +from sympy.functions.special.error_functions import (Ei, erf, erfc) +from sympy.functions.special.gamma_functions import (digamma, gamma, loggamma, lowergamma, multigamma, polygamma, trigamma, uppergamma) +from sympy.functions.special.zeta_functions import zeta +from sympy.series.order import O + +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.testing.pytest import raises +from sympy.core.random import (test_derivative_numerically as td, + random_complex_number as randcplx, + verify_numerically as tn) + +x = Symbol('x') +y = Symbol('y') +n = Symbol('n', integer=True) +w = Symbol('w', real=True) + +def test_gamma(): + assert gamma(nan) is nan + assert gamma(oo) is oo + + assert gamma(-100) is zoo + assert gamma(0) is zoo + assert gamma(-100.0) is zoo + + assert gamma(1) == 1 + assert gamma(2) == 1 + assert gamma(3) == 2 + + assert gamma(102) == factorial(101) + + assert gamma(S.Half) == sqrt(pi) + + assert gamma(Rational(3, 2)) == sqrt(pi)*S.Half + assert gamma(Rational(5, 2)) == sqrt(pi)*Rational(3, 4) + assert gamma(Rational(7, 2)) == sqrt(pi)*Rational(15, 8) + + assert gamma(Rational(-1, 2)) == -2*sqrt(pi) + assert gamma(Rational(-3, 2)) == sqrt(pi)*Rational(4, 3) + assert gamma(Rational(-5, 2)) == sqrt(pi)*Rational(-8, 15) + + assert gamma(Rational(-15, 2)) == sqrt(pi)*Rational(256, 2027025) + + assert gamma(Rational( + -11, 8)).expand(func=True) == Rational(64, 33)*gamma(Rational(5, 8)) + assert gamma(Rational( + -10, 3)).expand(func=True) == Rational(81, 280)*gamma(Rational(2, 3)) + assert gamma(Rational( + 14, 3)).expand(func=True) == Rational(880, 81)*gamma(Rational(2, 3)) + assert gamma(Rational( + 17, 7)).expand(func=True) == Rational(30, 49)*gamma(Rational(3, 7)) + assert gamma(Rational( + 19, 8)).expand(func=True) == Rational(33, 64)*gamma(Rational(3, 8)) + + assert gamma(x).diff(x) == gamma(x)*polygamma(0, x) + + assert gamma(x - 1).expand(func=True) == gamma(x)/(x - 1) + assert gamma(x + 2).expand(func=True, mul=False) == x*(x + 1)*gamma(x) + + assert conjugate(gamma(x)) == gamma(conjugate(x)) + + assert expand_func(gamma(x + Rational(3, 2))) == \ + (x + S.Half)*gamma(x + S.Half) + + assert expand_func(gamma(x - S.Half)) == \ + gamma(S.Half + x)/(x - S.Half) + + # Test a bug: + assert expand_func(gamma(x + Rational(3, 4))) == gamma(x + Rational(3, 4)) + + # XXX: Not sure about these tests. I can fix them by defining e.g. + # exp_polar.is_integer but I'm not sure if that makes sense. + assert gamma(3*exp_polar(I*pi)/4).is_nonnegative is False + assert gamma(3*exp_polar(I*pi)/4).is_extended_nonpositive is True + + y = Symbol('y', nonpositive=True, integer=True) + assert gamma(y).is_real == False + y = Symbol('y', positive=True, noninteger=True) + assert gamma(y).is_real == True + + assert gamma(-1.0, evaluate=False).is_real == False + assert gamma(0, evaluate=False).is_real == False + assert gamma(-2, evaluate=False).is_real == False + + +def test_gamma_rewrite(): + assert gamma(n).rewrite(factorial) == factorial(n - 1) + + +def test_gamma_series(): + assert gamma(x + 1).series(x, 0, 3) == \ + 1 - EulerGamma*x + x**2*(EulerGamma**2/2 + pi**2/12) + O(x**3) + assert gamma(x).series(x, -1, 3) == \ + -1/(x + 1) + EulerGamma - 1 + (x + 1)*(-1 - pi**2/12 - EulerGamma**2/2 + \ + EulerGamma) + (x + 1)**2*(-1 - pi**2/12 - EulerGamma**2/2 + EulerGamma**3/6 - \ + polygamma(2, 1)/6 + EulerGamma*pi**2/12 + EulerGamma) + O((x + 1)**3, (x, -1)) + + +def tn_branch(s, func): + from sympy.core.random import uniform + c = uniform(1, 5) + expr = func(s, c*exp_polar(I*pi)) - func(s, c*exp_polar(-I*pi)) + eps = 1e-15 + expr2 = func(s + eps, -c + eps*I) - func(s + eps, -c - eps*I) + return abs(expr.n() - expr2.n()).n() < 1e-10 + + +def test_lowergamma(): + from sympy.functions.special.error_functions import expint + from sympy.functions.special.hyper import meijerg + assert lowergamma(x, 0) == 0 + assert lowergamma(x, y).diff(y) == y**(x - 1)*exp(-y) + assert td(lowergamma(randcplx(), y), y) + assert td(lowergamma(x, randcplx()), x) + assert lowergamma(x, y).diff(x) == \ + gamma(x)*digamma(x) - uppergamma(x, y)*log(y) \ + - meijerg([], [1, 1], [0, 0, x], [], y) + + assert lowergamma(S.Half, x) == sqrt(pi)*erf(sqrt(x)) + assert not lowergamma(S.Half - 3, x).has(lowergamma) + assert not lowergamma(S.Half + 3, x).has(lowergamma) + assert lowergamma(S.Half, x, evaluate=False).has(lowergamma) + assert tn(lowergamma(S.Half + 3, x, evaluate=False), + lowergamma(S.Half + 3, x), x) + assert tn(lowergamma(S.Half - 3, x, evaluate=False), + lowergamma(S.Half - 3, x), x) + + assert tn_branch(-3, lowergamma) + assert tn_branch(-4, lowergamma) + assert tn_branch(Rational(1, 3), lowergamma) + assert tn_branch(pi, lowergamma) + assert lowergamma(3, exp_polar(4*pi*I)*x) == lowergamma(3, x) + assert lowergamma(y, exp_polar(5*pi*I)*x) == \ + exp(4*I*pi*y)*lowergamma(y, x*exp_polar(pi*I)) + assert lowergamma(-2, exp_polar(5*pi*I)*x) == \ + lowergamma(-2, x*exp_polar(I*pi)) + 2*pi*I + + assert conjugate(lowergamma(x, y)) == lowergamma(conjugate(x), conjugate(y)) + assert conjugate(lowergamma(x, 0)) == 0 + assert unchanged(conjugate, lowergamma(x, -oo)) + + assert lowergamma(0, x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(S(1)/3, x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(1, x, evaluate=False)._eval_is_meromorphic(x, 0) == True + assert lowergamma(x, x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(x + 1, x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(1/x, x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(0, x + 1)._eval_is_meromorphic(x, 0) == False + assert lowergamma(S(1)/3, x + 1)._eval_is_meromorphic(x, 0) == True + assert lowergamma(1, x + 1, evaluate=False)._eval_is_meromorphic(x, 0) == True + assert lowergamma(x, x + 1)._eval_is_meromorphic(x, 0) == True + assert lowergamma(x + 1, x + 1)._eval_is_meromorphic(x, 0) == True + assert lowergamma(1/x, x + 1)._eval_is_meromorphic(x, 0) == False + assert lowergamma(0, 1/x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(S(1)/3, 1/x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(1, 1/x, evaluate=False)._eval_is_meromorphic(x, 0) == False + assert lowergamma(x, 1/x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(x + 1, 1/x)._eval_is_meromorphic(x, 0) == False + assert lowergamma(1/x, 1/x)._eval_is_meromorphic(x, 0) == False + + assert lowergamma(x, 2).series(x, oo, 3) == \ + 2**x*(1 + 2/(x + 1))*exp(-2)/x + O(exp(x*log(2))/x**3, (x, oo)) + + assert lowergamma( + x, y).rewrite(expint) == -y**x*expint(-x + 1, y) + gamma(x) + k = Symbol('k', integer=True) + assert lowergamma( + k, y).rewrite(expint) == -y**k*expint(-k + 1, y) + gamma(k) + k = Symbol('k', integer=True, positive=False) + assert lowergamma(k, y).rewrite(expint) == lowergamma(k, y) + assert lowergamma(x, y).rewrite(uppergamma) == gamma(x) - uppergamma(x, y) + + assert lowergamma(70, 6) == factorial(69) - 69035724522603011058660187038367026272747334489677105069435923032634389419656200387949342530805432320 * exp(-6) + assert (lowergamma(S(77) / 2, 6) - lowergamma(S(77) / 2, 6, evaluate=False)).evalf() < 1e-16 + assert (lowergamma(-S(77) / 2, 6) - lowergamma(-S(77) / 2, 6, evaluate=False)).evalf() < 1e-16 + + +def test_uppergamma(): + from sympy.functions.special.error_functions import expint + from sympy.functions.special.hyper import meijerg + assert uppergamma(4, 0) == 6 + assert uppergamma(x, y).diff(y) == -y**(x - 1)*exp(-y) + assert td(uppergamma(randcplx(), y), y) + assert uppergamma(x, y).diff(x) == \ + uppergamma(x, y)*log(y) + meijerg([], [1, 1], [0, 0, x], [], y) + assert td(uppergamma(x, randcplx()), x) + + p = Symbol('p', positive=True) + assert uppergamma(0, p) == -Ei(-p) + assert uppergamma(p, 0) == gamma(p) + assert uppergamma(S.Half, x) == sqrt(pi)*erfc(sqrt(x)) + assert not uppergamma(S.Half - 3, x).has(uppergamma) + assert not uppergamma(S.Half + 3, x).has(uppergamma) + assert uppergamma(S.Half, x, evaluate=False).has(uppergamma) + assert tn(uppergamma(S.Half + 3, x, evaluate=False), + uppergamma(S.Half + 3, x), x) + assert tn(uppergamma(S.Half - 3, x, evaluate=False), + uppergamma(S.Half - 3, x), x) + + assert unchanged(uppergamma, x, -oo) + assert unchanged(uppergamma, x, 0) + + assert tn_branch(-3, uppergamma) + assert tn_branch(-4, uppergamma) + assert tn_branch(Rational(1, 3), uppergamma) + assert tn_branch(pi, uppergamma) + assert uppergamma(3, exp_polar(4*pi*I)*x) == uppergamma(3, x) + assert uppergamma(y, exp_polar(5*pi*I)*x) == \ + exp(4*I*pi*y)*uppergamma(y, x*exp_polar(pi*I)) + \ + gamma(y)*(1 - exp(4*pi*I*y)) + assert uppergamma(-2, exp_polar(5*pi*I)*x) == \ + uppergamma(-2, x*exp_polar(I*pi)) - 2*pi*I + + assert uppergamma(-2, x) == expint(3, x)/x**2 + + assert conjugate(uppergamma(x, y)) == uppergamma(conjugate(x), conjugate(y)) + assert unchanged(conjugate, uppergamma(x, -oo)) + + assert uppergamma(x, y).rewrite(expint) == y**x*expint(-x + 1, y) + assert uppergamma(x, y).rewrite(lowergamma) == gamma(x) - lowergamma(x, y) + + assert uppergamma(70, 6) == 69035724522603011058660187038367026272747334489677105069435923032634389419656200387949342530805432320*exp(-6) + assert (uppergamma(S(77) / 2, 6) - uppergamma(S(77) / 2, 6, evaluate=False)).evalf() < 1e-16 + assert (uppergamma(-S(77) / 2, 6) - uppergamma(-S(77) / 2, 6, evaluate=False)).evalf() < 1e-16 + + +def test_polygamma(): + assert polygamma(n, nan) is nan + + assert polygamma(0, oo) is oo + assert polygamma(0, -oo) is oo + assert polygamma(0, I*oo) is oo + assert polygamma(0, -I*oo) is oo + assert polygamma(1, oo) == 0 + assert polygamma(5, oo) == 0 + + assert polygamma(0, -9) is zoo + + assert polygamma(0, -9) is zoo + assert polygamma(0, -1) is zoo + assert polygamma(Rational(3, 2), -1) is zoo + + assert polygamma(0, 0) is zoo + + assert polygamma(0, 1) == -EulerGamma + assert polygamma(0, 7) == Rational(49, 20) - EulerGamma + + assert polygamma(1, 1) == pi**2/6 + assert polygamma(1, 2) == pi**2/6 - 1 + assert polygamma(1, 3) == pi**2/6 - Rational(5, 4) + assert polygamma(3, 1) == pi**4 / 15 + assert polygamma(3, 5) == 6*(Rational(-22369, 20736) + pi**4/90) + assert polygamma(5, 1) == 8 * pi**6 / 63 + + assert polygamma(1, S.Half) == pi**2 / 2 + assert polygamma(2, S.Half) == -14*zeta(3) + assert polygamma(11, S.Half) == 176896*pi**12 + + def t(m, n): + x = S(m)/n + r = polygamma(0, x) + if r.has(polygamma): + return False + return abs(polygamma(0, x.n()).n() - r.n()).n() < 1e-10 + assert t(1, 2) + assert t(3, 2) + assert t(-1, 2) + assert t(1, 4) + assert t(-3, 4) + assert t(1, 3) + assert t(4, 3) + assert t(3, 4) + assert t(2, 3) + assert t(123, 5) + + assert polygamma(0, x).rewrite(zeta) == polygamma(0, x) + assert polygamma(1, x).rewrite(zeta) == zeta(2, x) + assert polygamma(2, x).rewrite(zeta) == -2*zeta(3, x) + assert polygamma(I, 2).rewrite(zeta) == polygamma(I, 2) + n1 = Symbol('n1') + n2 = Symbol('n2', real=True) + n3 = Symbol('n3', integer=True) + n4 = Symbol('n4', positive=True) + n5 = Symbol('n5', positive=True, integer=True) + assert polygamma(n1, x).rewrite(zeta) == polygamma(n1, x) + assert polygamma(n2, x).rewrite(zeta) == polygamma(n2, x) + assert polygamma(n3, x).rewrite(zeta) == polygamma(n3, x) + assert polygamma(n4, x).rewrite(zeta) == polygamma(n4, x) + assert polygamma(n5, x).rewrite(zeta) == (-1)**(n5 + 1) * factorial(n5) * zeta(n5 + 1, x) + + assert polygamma(3, 7*x).diff(x) == 7*polygamma(4, 7*x) + + assert polygamma(0, x).rewrite(harmonic) == harmonic(x - 1) - EulerGamma + assert polygamma(2, x).rewrite(harmonic) == 2*harmonic(x - 1, 3) - 2*zeta(3) + ni = Symbol("n", integer=True) + assert polygamma(ni, x).rewrite(harmonic) == (-1)**(ni + 1)*(-harmonic(x - 1, ni + 1) + + zeta(ni + 1))*factorial(ni) + + # Polygamma of non-negative integer order is unbranched: + k = Symbol('n', integer=True, nonnegative=True) + assert polygamma(k, exp_polar(2*I*pi)*x) == polygamma(k, x) + + # but negative integers are branched! + k = Symbol('n', integer=True) + assert polygamma(k, exp_polar(2*I*pi)*x).args == (k, exp_polar(2*I*pi)*x) + + # Polygamma of order -1 is loggamma: + assert polygamma(-1, x) == loggamma(x) - log(2*pi) / 2 + + # But smaller orders are iterated integrals and don't have a special name + assert polygamma(-2, x).func is polygamma + + # Test a bug + assert polygamma(0, -x).expand(func=True) == polygamma(0, -x) + + assert polygamma(2, 2.5).is_positive == False + assert polygamma(2, -2.5).is_positive == False + assert polygamma(3, 2.5).is_positive == True + assert polygamma(3, -2.5).is_positive is True + assert polygamma(-2, -2.5).is_positive is None + assert polygamma(-3, -2.5).is_positive is None + + assert polygamma(2, 2.5).is_negative == True + assert polygamma(3, 2.5).is_negative == False + assert polygamma(3, -2.5).is_negative == False + assert polygamma(2, -2.5).is_negative is True + assert polygamma(-2, -2.5).is_negative is None + assert polygamma(-3, -2.5).is_negative is None + + assert polygamma(I, 2).is_positive is None + assert polygamma(I, 3).is_negative is None + + # issue 17350 + assert (I*polygamma(I, pi)).as_real_imag() == \ + (-im(polygamma(I, pi)), re(polygamma(I, pi))) + assert (tanh(polygamma(I, 1))).rewrite(exp) == \ + (exp(polygamma(I, 1)) - exp(-polygamma(I, 1)))/(exp(polygamma(I, 1)) + exp(-polygamma(I, 1))) + assert (I / polygamma(I, 4)).rewrite(exp) == \ + I*exp(-I*atan(im(polygamma(I, 4))/re(polygamma(I, 4))))/Abs(polygamma(I, 4)) + + # issue 12569 + assert unchanged(im, polygamma(0, I)) + assert polygamma(Symbol('a', positive=True), Symbol('b', positive=True)).is_real is True + assert polygamma(0, I).is_real is None + + assert str(polygamma(pi, 3).evalf(n=10)) == "0.1169314564" + assert str(polygamma(2.3, 1.0).evalf(n=10)) == "-3.003302909" + assert str(polygamma(-1, 1).evalf(n=10)) == "-0.9189385332" # not zero + assert str(polygamma(I, 1).evalf(n=10)) == "-3.109856569 + 1.89089016*I" + assert str(polygamma(1, I).evalf(n=10)) == "-0.5369999034 - 0.7942335428*I" + assert str(polygamma(I, I).evalf(n=10)) == "6.332362889 + 45.92828268*I" + + +def test_polygamma_expand_func(): + assert polygamma(0, x).expand(func=True) == polygamma(0, x) + assert polygamma(0, 2*x).expand(func=True) == \ + polygamma(0, x)/2 + polygamma(0, S.Half + x)/2 + log(2) + assert polygamma(1, 2*x).expand(func=True) == \ + polygamma(1, x)/4 + polygamma(1, S.Half + x)/4 + assert polygamma(2, x).expand(func=True) == \ + polygamma(2, x) + assert polygamma(0, -1 + x).expand(func=True) == \ + polygamma(0, x) - 1/(x - 1) + assert polygamma(0, 1 + x).expand(func=True) == \ + 1/x + polygamma(0, x ) + assert polygamma(0, 2 + x).expand(func=True) == \ + 1/x + 1/(1 + x) + polygamma(0, x) + assert polygamma(0, 3 + x).expand(func=True) == \ + polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + assert polygamma(0, 4 + x).expand(func=True) == \ + polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + 1/(3 + x) + assert polygamma(1, 1 + x).expand(func=True) == \ + polygamma(1, x) - 1/x**2 + assert polygamma(1, 2 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 + assert polygamma(1, 3 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - 1/(2 + x)**2 + assert polygamma(1, 4 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - \ + 1/(2 + x)**2 - 1/(3 + x)**2 + assert polygamma(0, x + y).expand(func=True) == \ + polygamma(0, x + y) + assert polygamma(1, x + y).expand(func=True) == \ + polygamma(1, x + y) + assert polygamma(1, 3 + 4*x + y).expand(func=True, multinomial=False) == \ + polygamma(1, y + 4*x) - 1/(y + 4*x)**2 - \ + 1/(1 + y + 4*x)**2 - 1/(2 + y + 4*x)**2 + assert polygamma(3, 3 + 4*x + y).expand(func=True, multinomial=False) == \ + polygamma(3, y + 4*x) - 6/(y + 4*x)**4 - \ + 6/(1 + y + 4*x)**4 - 6/(2 + y + 4*x)**4 + assert polygamma(3, 4*x + y + 1).expand(func=True, multinomial=False) == \ + polygamma(3, y + 4*x) - 6/(y + 4*x)**4 + e = polygamma(3, 4*x + y + Rational(3, 2)) + assert e.expand(func=True) == e + e = polygamma(3, x + y + Rational(3, 4)) + assert e.expand(func=True, basic=False) == e + + assert polygamma(-1, x, evaluate=False).expand(func=True) == \ + loggamma(x) - log(pi)/2 - log(2)/2 + p2 = polygamma(-2, x).expand(func=True) + x**2/2 - x/2 + S(1)/12 + assert isinstance(p2, Subs) + assert p2.point == (-1,) + + +def test_digamma(): + assert digamma(nan) == nan + + assert digamma(oo) == oo + assert digamma(-oo) == oo + assert digamma(I*oo) == oo + assert digamma(-I*oo) == oo + + assert digamma(-9) == zoo + + assert digamma(-9) == zoo + assert digamma(-1) == zoo + + assert digamma(0) == zoo + + assert digamma(1) == -EulerGamma + assert digamma(7) == Rational(49, 20) - EulerGamma + + def t(m, n): + x = S(m)/n + r = digamma(x) + if r.has(digamma): + return False + return abs(digamma(x.n()).n() - r.n()).n() < 1e-10 + assert t(1, 2) + assert t(3, 2) + assert t(-1, 2) + assert t(1, 4) + assert t(-3, 4) + assert t(1, 3) + assert t(4, 3) + assert t(3, 4) + assert t(2, 3) + assert t(123, 5) + + assert digamma(x).rewrite(zeta) == polygamma(0, x) + + assert digamma(x).rewrite(harmonic) == harmonic(x - 1) - EulerGamma + + assert digamma(I).is_real is None + + assert digamma(x,evaluate=False).fdiff() == polygamma(1, x) + + assert digamma(x,evaluate=False).is_real is None + + assert digamma(x,evaluate=False).is_positive is None + + assert digamma(x,evaluate=False).is_negative is None + + assert digamma(x,evaluate=False).rewrite(polygamma) == polygamma(0, x) + + +def test_digamma_expand_func(): + assert digamma(x).expand(func=True) == polygamma(0, x) + assert digamma(2*x).expand(func=True) == \ + polygamma(0, x)/2 + polygamma(0, Rational(1, 2) + x)/2 + log(2) + assert digamma(-1 + x).expand(func=True) == \ + polygamma(0, x) - 1/(x - 1) + assert digamma(1 + x).expand(func=True) == \ + 1/x + polygamma(0, x ) + assert digamma(2 + x).expand(func=True) == \ + 1/x + 1/(1 + x) + polygamma(0, x) + assert digamma(3 + x).expand(func=True) == \ + polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + assert digamma(4 + x).expand(func=True) == \ + polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + 1/(3 + x) + assert digamma(x + y).expand(func=True) == \ + polygamma(0, x + y) + +def test_trigamma(): + assert trigamma(nan) == nan + + assert trigamma(oo) == 0 + + assert trigamma(1) == pi**2/6 + assert trigamma(2) == pi**2/6 - 1 + assert trigamma(3) == pi**2/6 - Rational(5, 4) + + assert trigamma(x, evaluate=False).rewrite(zeta) == zeta(2, x) + assert trigamma(x, evaluate=False).rewrite(harmonic) == \ + trigamma(x).rewrite(polygamma).rewrite(harmonic) + + assert trigamma(x,evaluate=False).fdiff() == polygamma(2, x) + + assert trigamma(x,evaluate=False).is_real is None + + assert trigamma(x,evaluate=False).is_positive is None + + assert trigamma(x,evaluate=False).is_negative is None + + assert trigamma(x,evaluate=False).rewrite(polygamma) == polygamma(1, x) + +def test_trigamma_expand_func(): + assert trigamma(2*x).expand(func=True) == \ + polygamma(1, x)/4 + polygamma(1, Rational(1, 2) + x)/4 + assert trigamma(1 + x).expand(func=True) == \ + polygamma(1, x) - 1/x**2 + assert trigamma(2 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 + assert trigamma(3 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - 1/(2 + x)**2 + assert trigamma(4 + x).expand(func=True, multinomial=False) == \ + polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - \ + 1/(2 + x)**2 - 1/(3 + x)**2 + assert trigamma(x + y).expand(func=True) == \ + polygamma(1, x + y) + assert trigamma(3 + 4*x + y).expand(func=True, multinomial=False) == \ + polygamma(1, y + 4*x) - 1/(y + 4*x)**2 - \ + 1/(1 + y + 4*x)**2 - 1/(2 + y + 4*x)**2 + +def test_loggamma(): + raises(TypeError, lambda: loggamma(2, 3)) + raises(ArgumentIndexError, lambda: loggamma(x).fdiff(2)) + + assert loggamma(-1) is oo + assert loggamma(-2) is oo + assert loggamma(0) is oo + assert loggamma(1) == 0 + assert loggamma(2) == 0 + assert loggamma(3) == log(2) + assert loggamma(4) == log(6) + + n = Symbol("n", integer=True, positive=True) + assert loggamma(n) == log(gamma(n)) + assert loggamma(-n) is oo + assert loggamma(n/2) == log(2**(-n + 1)*sqrt(pi)*gamma(n)/gamma(n/2 + S.Half)) + + assert loggamma(oo) is oo + assert loggamma(-oo) is zoo + assert loggamma(I*oo) is zoo + assert loggamma(-I*oo) is zoo + assert loggamma(zoo) is zoo + assert loggamma(nan) is nan + + L = loggamma(Rational(16, 3)) + E = -5*log(3) + loggamma(Rational(1, 3)) + log(4) + log(7) + log(10) + log(13) + assert expand_func(L).doit() == E + assert L.n() == E.n() + + L = loggamma(Rational(19, 4)) + E = -4*log(4) + loggamma(Rational(3, 4)) + log(3) + log(7) + log(11) + log(15) + assert expand_func(L).doit() == E + assert L.n() == E.n() + + L = loggamma(Rational(23, 7)) + E = -3*log(7) + log(2) + loggamma(Rational(2, 7)) + log(9) + log(16) + assert expand_func(L).doit() == E + assert L.n() == E.n() + + L = loggamma(Rational(19, 4) - 7) + E = -log(9) - log(5) + loggamma(Rational(3, 4)) + 3*log(4) - 3*I*pi + assert expand_func(L).doit() == E + assert L.n() == E.n() + + L = loggamma(Rational(23, 7) - 6) + E = -log(19) - log(12) - log(5) + loggamma(Rational(2, 7)) + 3*log(7) - 3*I*pi + assert expand_func(L).doit() == E + assert L.n() == E.n() + + assert loggamma(x).diff(x) == polygamma(0, x) + s1 = loggamma(1/(x + sin(x)) + cos(x)).nseries(x, n=4) + s2 = (-log(2*x) - 1)/(2*x) - log(x/pi)/2 + (4 - log(2*x))*x/24 + O(x**2) + \ + log(x)*x**2/2 + assert (s1 - s2).expand(force=True).removeO() == 0 + s1 = loggamma(1/x).series(x) + s2 = (1/x - S.Half)*log(1/x) - 1/x + log(2*pi)/2 + \ + x/12 - x**3/360 + x**5/1260 + O(x**7) + assert ((s1 - s2).expand(force=True)).removeO() == 0 + + assert loggamma(x).rewrite('intractable') == log(gamma(x)) + + s1 = loggamma(x).series(x).cancel() + assert s1 == -log(x) - EulerGamma*x + pi**2*x**2/12 + x**3*polygamma(2, 1)/6 + \ + pi**4*x**4/360 + x**5*polygamma(4, 1)/120 + O(x**6) + assert s1 == loggamma(x).rewrite('intractable').series(x).cancel() + + assert conjugate(loggamma(x)) == loggamma(conjugate(x)) + assert conjugate(loggamma(0)) is oo + assert conjugate(loggamma(1)) == loggamma(conjugate(1)) + assert conjugate(loggamma(-oo)) == conjugate(zoo) + + assert loggamma(Symbol('v', positive=True)).is_real is True + assert loggamma(Symbol('v', zero=True)).is_real is False + assert loggamma(Symbol('v', negative=True)).is_real is False + assert loggamma(Symbol('v', nonpositive=True)).is_real is False + assert loggamma(Symbol('v', nonnegative=True)).is_real is None + assert loggamma(Symbol('v', imaginary=True)).is_real is None + assert loggamma(Symbol('v', real=True)).is_real is None + assert loggamma(Symbol('v')).is_real is None + + assert loggamma(S.Half).is_real is True + assert loggamma(0).is_real is False + assert loggamma(Rational(-1, 2)).is_real is False + assert loggamma(I).is_real is None + assert loggamma(2 + 3*I).is_real is None + + def tN(N, M): + assert loggamma(1/x)._eval_nseries(x, n=N).getn() == M + tN(0, 0) + tN(1, 1) + tN(2, 2) + tN(3, 3) + tN(4, 4) + tN(5, 5) + + +def test_polygamma_expansion(): + # A. & S., pa. 259 and 260 + assert polygamma(0, 1/x).nseries(x, n=3) == \ + -log(x) - x/2 - x**2/12 + O(x**3) + assert polygamma(1, 1/x).series(x, n=5) == \ + x + x**2/2 + x**3/6 + O(x**5) + assert polygamma(3, 1/x).nseries(x, n=11) == \ + 2*x**3 + 3*x**4 + 2*x**5 - x**7 + 4*x**9/3 + O(x**11) + + +def test_polygamma_leading_term(): + expr = -log(1/x) + polygamma(0, 1 + 1/x) + S.EulerGamma + assert expr.as_leading_term(x, logx=-y) == S.EulerGamma + + +def test_issue_8657(): + n = Symbol('n', negative=True, integer=True) + m = Symbol('m', integer=True) + o = Symbol('o', positive=True) + p = Symbol('p', negative=True, integer=False) + assert gamma(n).is_real is False + assert gamma(m).is_real is None + assert gamma(o).is_real is True + assert gamma(p).is_real is True + assert gamma(w).is_real is None + + +def test_issue_8524(): + x = Symbol('x', positive=True) + y = Symbol('y', negative=True) + z = Symbol('z', positive=False) + p = Symbol('p', negative=False) + q = Symbol('q', integer=True) + r = Symbol('r', integer=False) + e = Symbol('e', even=True, negative=True) + assert gamma(x).is_positive is True + assert gamma(y).is_positive is None + assert gamma(z).is_positive is None + assert gamma(p).is_positive is None + assert gamma(q).is_positive is None + assert gamma(r).is_positive is None + assert gamma(e + S.Half).is_positive is True + assert gamma(e - S.Half).is_positive is False + +def test_issue_14450(): + assert uppergamma(Rational(3, 8), x).evalf() == uppergamma(Rational(3, 8), x) + assert lowergamma(x, Rational(3, 8)).evalf() == lowergamma(x, Rational(3, 8)) + # some values from Wolfram Alpha for comparison + assert abs(uppergamma(Rational(3, 8), 2).evalf() - 0.07105675881) < 1e-9 + assert abs(lowergamma(Rational(3, 8), 2).evalf() - 2.2993794256) < 1e-9 + +def test_issue_14528(): + k = Symbol('k', integer=True, nonpositive=True) + assert isinstance(gamma(k), gamma) + +def test_multigamma(): + from sympy.concrete.products import Product + p = Symbol('p') + _k = Dummy('_k') + + assert multigamma(x, p).dummy_eq(pi**(p*(p - 1)/4)*\ + Product(gamma(x + (1 - _k)/2), (_k, 1, p))) + + assert conjugate(multigamma(x, p)).dummy_eq(pi**((conjugate(p) - 1)*\ + conjugate(p)/4)*Product(gamma(conjugate(x) + (1-conjugate(_k))/2), (_k, 1, p))) + assert conjugate(multigamma(x, 1)) == gamma(conjugate(x)) + + p = Symbol('p', positive=True) + assert conjugate(multigamma(x, p)).dummy_eq(pi**((p - 1)*p/4)*\ + Product(gamma(conjugate(x) + (1-conjugate(_k))/2), (_k, 1, p))) + + assert multigamma(nan, 1) is nan + assert multigamma(oo, 1).doit() is oo + + assert multigamma(1, 1) == 1 + assert multigamma(2, 1) == 1 + assert multigamma(3, 1) == 2 + + assert multigamma(102, 1) == factorial(101) + assert multigamma(S.Half, 1) == sqrt(pi) + + assert multigamma(1, 2) == pi + assert multigamma(2, 2) == pi/2 + + assert multigamma(1, 3) is zoo + assert multigamma(2, 3) == pi**2/2 + assert multigamma(3, 3) == 3*pi**2/2 + + assert multigamma(x, 1).diff(x) == gamma(x)*polygamma(0, x) + assert multigamma(x, 2).diff(x) == sqrt(pi)*gamma(x)*gamma(x - S.Half)*\ + polygamma(0, x) + sqrt(pi)*gamma(x)*gamma(x - S.Half)*polygamma(0, x - S.Half) + + assert multigamma(x - 1, 1).expand(func=True) == gamma(x)/(x - 1) + assert multigamma(x + 2, 1).expand(func=True, mul=False) == x*(x + 1)*\ + gamma(x) + assert multigamma(x - 1, 2).expand(func=True) == sqrt(pi)*gamma(x)*\ + gamma(x + S.Half)/(x**3 - 3*x**2 + x*Rational(11, 4) - Rational(3, 4)) + assert multigamma(x - 1, 3).expand(func=True) == pi**Rational(3, 2)*gamma(x)**2*\ + gamma(x + S.Half)/(x**5 - 6*x**4 + 55*x**3/4 - 15*x**2 + x*Rational(31, 4) - Rational(3, 2)) + + assert multigamma(n, 1).rewrite(factorial) == factorial(n - 1) + assert multigamma(n, 2).rewrite(factorial) == sqrt(pi)*\ + factorial(n - Rational(3, 2))*factorial(n - 1) + assert multigamma(n, 3).rewrite(factorial) == pi**Rational(3, 2)*\ + factorial(n - 2)*factorial(n - Rational(3, 2))*factorial(n - 1) + + assert multigamma(Rational(-1, 2), 3, evaluate=False).is_real == False + assert multigamma(S.Half, 3, evaluate=False).is_real == False + assert multigamma(0, 1, evaluate=False).is_real == False + assert multigamma(1, 3, evaluate=False).is_real == False + assert multigamma(-1.0, 3, evaluate=False).is_real == False + assert multigamma(0.7, 3, evaluate=False).is_real == True + assert multigamma(3, 3, evaluate=False).is_real == True + +def test_gamma_as_leading_term(): + assert gamma(x).as_leading_term(x) == 1/x + assert gamma(2 + x).as_leading_term(x) == S(1) + assert gamma(cos(x)).as_leading_term(x) == S(1) + assert gamma(sin(x)).as_leading_term(x) == 1/x diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_hyper.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_hyper.py new file mode 100644 index 0000000000000000000000000000000000000000..f1be5b5f0db158ff76173e180ed8d88bd59461b9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_hyper.py @@ -0,0 +1,403 @@ +from sympy.core.containers import Tuple +from sympy.core.function import Derivative +from sympy.core.numbers import (I, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import cos +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import (appellf1, hyper, meijerg) +from sympy.series.order import O +from sympy.abc import x, z, k +from sympy.series.limits import limit +from sympy.testing.pytest import raises, slow +from sympy.core.random import ( + random_complex_number as randcplx, + verify_numerically as tn, + test_derivative_numerically as td) + + +def test_TupleParametersBase(): + # test that our implementation of the chain rule works + p = hyper((), (), z**2) + assert p.diff(z) == p*2*z + + +def test_hyper(): + raises(TypeError, lambda: hyper(1, 2, z)) + + assert hyper((2, 1), (1,), z) == hyper(Tuple(1, 2), Tuple(1), z) + assert hyper((2, 1, 2), (1, 2, 1, 3), z) == hyper((2,), (1, 3), z) + u = hyper((2, 1, 2), (1, 2, 1, 3), z, evaluate=False) + assert u.ap == Tuple(1, 2, 2) + assert u.bq == Tuple(1, 1, 2, 3) + + h = hyper((1, 2), (3, 4, 5), z) + assert h.ap == Tuple(1, 2) + assert h.bq == Tuple(3, 4, 5) + assert h.argument == z + assert h.is_commutative is True + h = hyper((2, 1), (4, 3, 5), z) + assert h.ap == Tuple(1, 2) + assert h.bq == Tuple(3, 4, 5) + assert h.argument == z + assert h.is_commutative is True + + # just a few checks to make sure that all arguments go where they should + assert tn(hyper(Tuple(), Tuple(), z), exp(z), z) + assert tn(z*hyper((1, 1), Tuple(2), -z), log(1 + z), z) + + # differentiation + h = hyper( + (randcplx(), randcplx(), randcplx()), (randcplx(), randcplx()), z) + assert td(h, z) + + a1, a2, b1, b2, b3 = symbols('a1:3, b1:4') + assert hyper((a1, a2), (b1, b2, b3), z).diff(z) == \ + a1*a2/(b1*b2*b3) * hyper((a1 + 1, a2 + 1), (b1 + 1, b2 + 1, b3 + 1), z) + + # differentiation wrt parameters is not supported + assert hyper([z], [], z).diff(z) == Derivative(hyper([z], [], z), z) + + # hyper is unbranched wrt parameters + from sympy.functions.elementary.complexes import polar_lift + assert hyper([polar_lift(z)], [polar_lift(k)], polar_lift(x)) == \ + hyper([z], [k], polar_lift(x)) + + # hyper does not automatically evaluate anyway, but the test is to make + # sure that the evaluate keyword is accepted + assert hyper((1, 2), (1,), z, evaluate=False).func is hyper + + +def test_expand_func(): + # evaluation at 1 of Gauss' hypergeometric function: + from sympy.abc import a, b, c + from sympy.core.function import expand_func + a1, b1, c1 = randcplx(), randcplx(), randcplx() + 5 + assert expand_func(hyper([a, b], [c], 1)) == \ + gamma(c)*gamma(-a - b + c)/(gamma(-a + c)*gamma(-b + c)) + assert abs(expand_func(hyper([a1, b1], [c1], 1)).n() + - hyper([a1, b1], [c1], 1).n()) < 1e-10 + + # hyperexpand wrapper for hyper: + assert expand_func(hyper([], [], z)) == exp(z) + assert expand_func(hyper([1, 2, 3], [], z)) == hyper([1, 2, 3], [], z) + assert expand_func(meijerg([[1, 1], []], [[1], [0]], z)) == log(z + 1) + assert expand_func(meijerg([[1, 1], []], [[], []], z)) == \ + meijerg([[1, 1], []], [[], []], z) + + +def replace_dummy(expr, sym): + from sympy.core.symbol import Dummy + dum = expr.atoms(Dummy) + if not dum: + return expr + assert len(dum) == 1 + return expr.xreplace({dum.pop(): sym}) + + +def test_hyper_rewrite_sum(): + from sympy.concrete.summations import Sum + from sympy.core.symbol import Dummy + from sympy.functions.combinatorial.factorials import (RisingFactorial, factorial) + _k = Dummy("k") + assert replace_dummy(hyper((1, 2), (1, 3), x).rewrite(Sum), _k) == \ + Sum(x**_k / factorial(_k) * RisingFactorial(2, _k) / + RisingFactorial(3, _k), (_k, 0, oo)) + + assert hyper((1, 2, 3), (-1, 3), z).rewrite(Sum) == \ + hyper((1, 2, 3), (-1, 3), z) + + +def test_radius_of_convergence(): + assert hyper((1, 2), [3], z).radius_of_convergence == 1 + assert hyper((1, 2), [3, 4], z).radius_of_convergence is oo + assert hyper((1, 2, 3), [4], z).radius_of_convergence == 0 + assert hyper((0, 1, 2), [4], z).radius_of_convergence is oo + assert hyper((-1, 1, 2), [-4], z).radius_of_convergence == 0 + assert hyper((-1, -2, 2), [-1], z).radius_of_convergence is oo + assert hyper((-1, 2), [-1, -2], z).radius_of_convergence == 0 + assert hyper([-1, 1, 3], [-2, 2], z).radius_of_convergence == 1 + assert hyper([-1, 1], [-2, 2], z).radius_of_convergence is oo + assert hyper([-1, 1, 3], [-2], z).radius_of_convergence == 0 + assert hyper((-1, 2, 3, 4), [], z).radius_of_convergence is oo + + assert hyper([1, 1], [3], 1).convergence_statement == True + assert hyper([1, 1], [2], 1).convergence_statement == False + assert hyper([1, 1], [2], -1).convergence_statement == True + assert hyper([1, 1], [1], -1).convergence_statement == False + + +def test_meijer(): + raises(TypeError, lambda: meijerg(1, z)) + raises(TypeError, lambda: meijerg(((1,), (2,)), (3,), (4,), z)) + + assert meijerg(((1, 2), (3,)), ((4,), (5,)), z) == \ + meijerg(Tuple(1, 2), Tuple(3), Tuple(4), Tuple(5), z) + + g = meijerg((1, 2), (3, 4, 5), (6, 7, 8, 9), (10, 11, 12, 13, 14), z) + assert g.an == Tuple(1, 2) + assert g.ap == Tuple(1, 2, 3, 4, 5) + assert g.aother == Tuple(3, 4, 5) + assert g.bm == Tuple(6, 7, 8, 9) + assert g.bq == Tuple(6, 7, 8, 9, 10, 11, 12, 13, 14) + assert g.bother == Tuple(10, 11, 12, 13, 14) + assert g.argument == z + assert g.nu == 75 + assert g.delta == -1 + assert g.is_commutative is True + assert g.is_number is False + #issue 13071 + assert meijerg([[],[]], [[S.Half],[0]], 1).is_number is True + + assert meijerg([1, 2], [3], [4], [5], z).delta == S.Half + + # just a few checks to make sure that all arguments go where they should + assert tn(meijerg(Tuple(), Tuple(), Tuple(0), Tuple(), -z), exp(z), z) + assert tn(sqrt(pi)*meijerg(Tuple(), Tuple(), + Tuple(0), Tuple(S.Half), z**2/4), cos(z), z) + assert tn(meijerg(Tuple(1, 1), Tuple(), Tuple(1), Tuple(0), z), + log(1 + z), z) + + # test exceptions + raises(ValueError, lambda: meijerg(((3, 1), (2,)), ((oo,), (2, 0)), x)) + raises(ValueError, lambda: meijerg(((3, 1), (2,)), ((1,), (2, 0)), x)) + + # differentiation + g = meijerg((randcplx(),), (randcplx() + 2*I,), Tuple(), + (randcplx(), randcplx()), z) + assert td(g, z) + + g = meijerg(Tuple(), (randcplx(),), Tuple(), + (randcplx(), randcplx()), z) + assert td(g, z) + + g = meijerg(Tuple(), Tuple(), Tuple(randcplx()), + Tuple(randcplx(), randcplx()), z) + assert td(g, z) + + a1, a2, b1, b2, c1, c2, d1, d2 = symbols('a1:3, b1:3, c1:3, d1:3') + assert meijerg((a1, a2), (b1, b2), (c1, c2), (d1, d2), z).diff(z) == \ + (meijerg((a1 - 1, a2), (b1, b2), (c1, c2), (d1, d2), z) + + (a1 - 1)*meijerg((a1, a2), (b1, b2), (c1, c2), (d1, d2), z))/z + + assert meijerg([z, z], [], [], [], z).diff(z) == \ + Derivative(meijerg([z, z], [], [], [], z), z) + + # meijerg is unbranched wrt parameters + from sympy.functions.elementary.complexes import polar_lift as pl + assert meijerg([pl(a1)], [pl(a2)], [pl(b1)], [pl(b2)], pl(z)) == \ + meijerg([a1], [a2], [b1], [b2], pl(z)) + + # integrand + from sympy.abc import a, b, c, d, s + assert meijerg([a], [b], [c], [d], z).integrand(s) == \ + z**s*gamma(c - s)*gamma(-a + s + 1)/(gamma(b - s)*gamma(-d + s + 1)) + + +def test_meijerg_derivative(): + assert meijerg([], [1, 1], [0, 0, x], [], z).diff(x) == \ + log(z)*meijerg([], [1, 1], [0, 0, x], [], z) \ + + 2*meijerg([], [1, 1, 1], [0, 0, x, 0], [], z) + + y = randcplx() + a = 5 # mpmath chokes with non-real numbers, and Mod1 with floats + assert td(meijerg([x], [], [], [], y), x) + assert td(meijerg([x**2], [], [], [], y), x) + assert td(meijerg([], [x], [], [], y), x) + assert td(meijerg([], [], [x], [], y), x) + assert td(meijerg([], [], [], [x], y), x) + assert td(meijerg([x], [a], [a + 1], [], y), x) + assert td(meijerg([x], [a + 1], [a], [], y), x) + assert td(meijerg([x, a], [], [], [a + 1], y), x) + assert td(meijerg([x, a + 1], [], [], [a], y), x) + b = Rational(3, 2) + assert td(meijerg([a + 2], [b], [b - 3, x], [a], y), x) + + +def test_meijerg_period(): + assert meijerg([], [1], [0], [], x).get_period() == 2*pi + assert meijerg([1], [], [], [0], x).get_period() == 2*pi + assert meijerg([], [], [0], [], x).get_period() == 2*pi # exp(x) + assert meijerg( + [], [], [0], [S.Half], x).get_period() == 2*pi # cos(sqrt(x)) + assert meijerg( + [], [], [S.Half], [0], x).get_period() == 4*pi # sin(sqrt(x)) + assert meijerg([1, 1], [], [1], [0], x).get_period() is oo # log(1 + x) + + +def test_hyper_unpolarify(): + from sympy.functions.elementary.exponential import exp_polar + a = exp_polar(2*pi*I)*x + b = x + assert hyper([], [], a).argument == b + assert hyper([0], [], a).argument == a + assert hyper([0], [0], a).argument == b + assert hyper([0, 1], [0], a).argument == a + assert hyper([0, 1], [0], exp_polar(2*pi*I)).argument == 1 + + +@slow +def test_hyperrep(): + from sympy.functions.special.hyper import (HyperRep, HyperRep_atanh, + HyperRep_power1, HyperRep_power2, HyperRep_log1, HyperRep_asin1, + HyperRep_asin2, HyperRep_sqrts1, HyperRep_sqrts2, HyperRep_log2, + HyperRep_cosasin, HyperRep_sinasin) + # First test the base class works. + from sympy.functions.elementary.exponential import exp_polar + from sympy.functions.elementary.piecewise import Piecewise + a, b, c, d, z = symbols('a b c d z') + + class myrep(HyperRep): + @classmethod + def _expr_small(cls, x): + return a + + @classmethod + def _expr_small_minus(cls, x): + return b + + @classmethod + def _expr_big(cls, x, n): + return c*n + + @classmethod + def _expr_big_minus(cls, x, n): + return d*n + assert myrep(z).rewrite('nonrep') == Piecewise((0, abs(z) > 1), (a, True)) + assert myrep(exp_polar(I*pi)*z).rewrite('nonrep') == \ + Piecewise((0, abs(z) > 1), (b, True)) + assert myrep(exp_polar(2*I*pi)*z).rewrite('nonrep') == \ + Piecewise((c, abs(z) > 1), (a, True)) + assert myrep(exp_polar(3*I*pi)*z).rewrite('nonrep') == \ + Piecewise((d, abs(z) > 1), (b, True)) + assert myrep(exp_polar(4*I*pi)*z).rewrite('nonrep') == \ + Piecewise((2*c, abs(z) > 1), (a, True)) + assert myrep(exp_polar(5*I*pi)*z).rewrite('nonrep') == \ + Piecewise((2*d, abs(z) > 1), (b, True)) + assert myrep(z).rewrite('nonrepsmall') == a + assert myrep(exp_polar(I*pi)*z).rewrite('nonrepsmall') == b + + def t(func, hyp, z): + """ Test that func is a valid representation of hyp. """ + # First test that func agrees with hyp for small z + if not tn(func.rewrite('nonrepsmall'), hyp, z, + a=Rational(-1, 2), b=Rational(-1, 2), c=S.Half, d=S.Half): + return False + # Next check that the two small representations agree. + if not tn( + func.rewrite('nonrepsmall').subs( + z, exp_polar(I*pi)*z).replace(exp_polar, exp), + func.subs(z, exp_polar(I*pi)*z).rewrite('nonrepsmall'), + z, a=Rational(-1, 2), b=Rational(-1, 2), c=S.Half, d=S.Half): + return False + # Next check continuity along exp_polar(I*pi)*t + expr = func.subs(z, exp_polar(I*pi)*z).rewrite('nonrep') + if abs(expr.subs(z, 1 + 1e-15).n() - expr.subs(z, 1 - 1e-15).n()) > 1e-10: + return False + # Finally check continuity of the big reps. + + def dosubs(func, a, b): + rv = func.subs(z, exp_polar(a)*z).rewrite('nonrep') + return rv.subs(z, exp_polar(b)*z).replace(exp_polar, exp) + for n in [0, 1, 2, 3, 4, -1, -2, -3, -4]: + expr1 = dosubs(func, 2*I*pi*n, I*pi/2) + expr2 = dosubs(func, 2*I*pi*n + I*pi, -I*pi/2) + if not tn(expr1, expr2, z): + return False + expr1 = dosubs(func, 2*I*pi*(n + 1), -I*pi/2) + expr2 = dosubs(func, 2*I*pi*n + I*pi, I*pi/2) + if not tn(expr1, expr2, z): + return False + return True + + # Now test the various representatives. + a = Rational(1, 3) + assert t(HyperRep_atanh(z), hyper([S.Half, 1], [Rational(3, 2)], z), z) + assert t(HyperRep_power1(a, z), hyper([-a], [], z), z) + assert t(HyperRep_power2(a, z), hyper([a, a - S.Half], [2*a], z), z) + assert t(HyperRep_log1(z), -z*hyper([1, 1], [2], z), z) + assert t(HyperRep_asin1(z), hyper([S.Half, S.Half], [Rational(3, 2)], z), z) + assert t(HyperRep_asin2(z), hyper([1, 1], [Rational(3, 2)], z), z) + assert t(HyperRep_sqrts1(a, z), hyper([-a, S.Half - a], [S.Half], z), z) + assert t(HyperRep_sqrts2(a, z), + -2*z/(2*a + 1)*hyper([-a - S.Half, -a], [S.Half], z).diff(z), z) + assert t(HyperRep_log2(z), -z/4*hyper([Rational(3, 2), 1, 1], [2, 2], z), z) + assert t(HyperRep_cosasin(a, z), hyper([-a, a], [S.Half], z), z) + assert t(HyperRep_sinasin(a, z), 2*a*z*hyper([1 - a, 1 + a], [Rational(3, 2)], z), z) + + +@slow +def test_meijerg_eval(): + from sympy.functions.elementary.exponential import exp_polar + from sympy.functions.special.bessel import besseli + from sympy.abc import l + a = randcplx() + arg = x*exp_polar(k*pi*I) + expr1 = pi*meijerg([[], [(a + 1)/2]], [[a/2], [-a/2, (a + 1)/2]], arg**2/4) + expr2 = besseli(a, arg) + + # Test that the two expressions agree for all arguments. + for x_ in [0.5, 1.5]: + for k_ in [0.0, 0.1, 0.3, 0.5, 0.8, 1, 5.751, 15.3]: + assert abs((expr1 - expr2).n(subs={x: x_, k: k_})) < 1e-10 + assert abs((expr1 - expr2).n(subs={x: x_, k: -k_})) < 1e-10 + + # Test continuity independently + eps = 1e-13 + expr2 = expr1.subs(k, l) + for x_ in [0.5, 1.5]: + for k_ in [0.5, Rational(1, 3), 0.25, 0.75, Rational(2, 3), 1.0, 1.5]: + assert abs((expr1 - expr2).n( + subs={x: x_, k: k_ + eps, l: k_ - eps})) < 1e-10 + assert abs((expr1 - expr2).n( + subs={x: x_, k: -k_ + eps, l: -k_ - eps})) < 1e-10 + + expr = (meijerg(((0.5,), ()), ((0.5, 0, 0.5), ()), exp_polar(-I*pi)/4) + + meijerg(((0.5,), ()), ((0.5, 0, 0.5), ()), exp_polar(I*pi)/4)) \ + /(2*sqrt(pi)) + assert (expr - pi/exp(1)).n(chop=True) == 0 + + +def test_limits(): + k, x = symbols('k, x') + assert hyper((1,), (Rational(4, 3), Rational(5, 3)), k**2).series(k) == \ + 1 + 9*k**2/20 + 81*k**4/1120 + O(k**6) # issue 6350 + + # https://github.com/sympy/sympy/issues/11465 + assert limit(1/hyper((1, ), (1, ), x), x, 0) == 1 + + +def test_appellf1(): + a, b1, b2, c, x, y = symbols('a b1 b2 c x y') + assert appellf1(a, b2, b1, c, y, x) == appellf1(a, b1, b2, c, x, y) + assert appellf1(a, b1, b1, c, y, x) == appellf1(a, b1, b1, c, x, y) + assert appellf1(a, b1, b2, c, S.Zero, S.Zero) is S.One + + f = appellf1(a, b1, b2, c, S.Zero, S.Zero, evaluate=False) + assert f.func is appellf1 + assert f.doit() is S.One + + +def test_derivative_appellf1(): + from sympy.core.function import diff + a, b1, b2, c, x, y, z = symbols('a b1 b2 c x y z') + assert diff(appellf1(a, b1, b2, c, x, y), x) == a*b1*appellf1(a + 1, b2, b1 + 1, c + 1, y, x)/c + assert diff(appellf1(a, b1, b2, c, x, y), y) == a*b2*appellf1(a + 1, b1, b2 + 1, c + 1, x, y)/c + assert diff(appellf1(a, b1, b2, c, x, y), z) == 0 + assert diff(appellf1(a, b1, b2, c, x, y), a) == Derivative(appellf1(a, b1, b2, c, x, y), a) + + +def test_eval_nseries(): + a1, b1, a2, b2 = symbols('a1 b1 a2 b2') + assert hyper((1,2), (1,2,3), x**2)._eval_nseries(x, 7, None) == \ + 1 + x**2/3 + x**4/24 + x**6/360 + O(x**7) + assert exp(x)._eval_nseries(x,7,None) == \ + hyper((a1, b1), (a1, b1), x)._eval_nseries(x, 7, None) + assert hyper((a1, a2), (b1, b2), x)._eval_nseries(z, 7, None) ==\ + hyper((a1, a2), (b1, b2), x) + O(z**7) + assert hyper((-S(1)/2, S(1)/2), (1,), 4*x/(x + 1)).nseries(x) == \ + 1 - x + x**2/4 - 3*x**3/4 - 15*x**4/64 - 93*x**5/64 + O(x**6) + assert (pi/2*hyper((-S(1)/2, S(1)/2), (1,), 4*x/(x + 1))).nseries(x) == \ + pi/2 - pi*x/2 + pi*x**2/8 - 3*pi*x**3/8 - 15*pi*x**4/128 - 93*pi*x**5/128 + O(x**6) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_mathieu.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_mathieu.py new file mode 100644 index 0000000000000000000000000000000000000000..b9296f0657d920c8d297f820fb3ab8b6a53129ab --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_mathieu.py @@ -0,0 +1,29 @@ +from sympy.core.function import diff +from sympy.functions.elementary.complexes import conjugate +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.mathieu_functions import (mathieuc, mathieucprime, mathieus, mathieusprime) + +from sympy.abc import a, q, z + + +def test_mathieus(): + assert isinstance(mathieus(a, q, z), mathieus) + assert mathieus(a, 0, z) == sin(sqrt(a)*z) + assert conjugate(mathieus(a, q, z)) == mathieus(conjugate(a), conjugate(q), conjugate(z)) + assert diff(mathieus(a, q, z), z) == mathieusprime(a, q, z) + +def test_mathieuc(): + assert isinstance(mathieuc(a, q, z), mathieuc) + assert mathieuc(a, 0, z) == cos(sqrt(a)*z) + assert diff(mathieuc(a, q, z), z) == mathieucprime(a, q, z) + +def test_mathieusprime(): + assert isinstance(mathieusprime(a, q, z), mathieusprime) + assert mathieusprime(a, 0, z) == sqrt(a)*cos(sqrt(a)*z) + assert diff(mathieusprime(a, q, z), z) == (-a + 2*q*cos(2*z))*mathieus(a, q, z) + +def test_mathieucprime(): + assert isinstance(mathieucprime(a, q, z), mathieucprime) + assert mathieucprime(a, 0, z) == -sqrt(a)*sin(sqrt(a)*z) + assert diff(mathieucprime(a, q, z), z) == (-a + 2*q*cos(2*z))*mathieuc(a, q, z) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_singularity_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_singularity_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..dbd85cb0c7e5524d4fe1441615879b9776ad1693 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_singularity_functions.py @@ -0,0 +1,129 @@ +from sympy.core.function import (Derivative, diff) +from sympy.core.numbers import (Float, I, nan, oo, pi) +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.delta_functions import (DiracDelta, Heaviside) +from sympy.functions.special.singularity_functions import SingularityFunction +from sympy.series.order import O + + +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.testing.pytest import raises + +x, y, a, n = symbols('x y a n') + + +def test_fdiff(): + assert SingularityFunction(x, 4, 5).fdiff() == 5*SingularityFunction(x, 4, 4) + assert SingularityFunction(x, 4, -1).fdiff() == SingularityFunction(x, 4, -2) + assert SingularityFunction(x, 4, -2).fdiff() == SingularityFunction(x, 4, -3) + assert SingularityFunction(x, 4, -3).fdiff() == SingularityFunction(x, 4, -4) + assert SingularityFunction(x, 4, 0).fdiff() == SingularityFunction(x, 4, -1) + + assert SingularityFunction(y, 6, 2).diff(y) == 2*SingularityFunction(y, 6, 1) + assert SingularityFunction(y, -4, -1).diff(y) == SingularityFunction(y, -4, -2) + assert SingularityFunction(y, 4, 0).diff(y) == SingularityFunction(y, 4, -1) + assert SingularityFunction(y, 4, 0).diff(y, 2) == SingularityFunction(y, 4, -2) + + n = Symbol('n', positive=True) + assert SingularityFunction(x, a, n).fdiff() == n*SingularityFunction(x, a, n - 1) + assert SingularityFunction(y, a, n).diff(y) == n*SingularityFunction(y, a, n - 1) + + expr_in = 4*SingularityFunction(x, a, n) + 3*SingularityFunction(x, a, -1) + -10*SingularityFunction(x, a, 0) + expr_out = n*4*SingularityFunction(x, a, n - 1) + 3*SingularityFunction(x, a, -2) - 10*SingularityFunction(x, a, -1) + assert diff(expr_in, x) == expr_out + + assert SingularityFunction(x, -10, 5).diff(evaluate=False) == ( + Derivative(SingularityFunction(x, -10, 5), x)) + + raises(ArgumentIndexError, lambda: SingularityFunction(x, 4, 5).fdiff(2)) + + +def test_eval(): + assert SingularityFunction(x, a, n).func == SingularityFunction + assert unchanged(SingularityFunction, x, 5, n) + assert SingularityFunction(5, 3, 2) == 4 + assert SingularityFunction(3, 5, 1) == 0 + assert SingularityFunction(3, 3, 0) == 1 + assert SingularityFunction(3, 3, 1) == 0 + assert SingularityFunction(Symbol('z', zero=True), 0, 1) == 0 # like sin(z) == 0 + assert SingularityFunction(4, 4, -1) is oo + assert SingularityFunction(4, 2, -1) == 0 + assert SingularityFunction(4, 7, -1) == 0 + assert SingularityFunction(5, 6, -2) == 0 + assert SingularityFunction(4, 2, -2) == 0 + assert SingularityFunction(4, 4, -2) is oo + assert SingularityFunction(4, 2, -3) == 0 + assert SingularityFunction(8, 8, -3) is oo + assert SingularityFunction(4, 2, -4) == 0 + assert SingularityFunction(8, 8, -4) is oo + assert (SingularityFunction(6.1, 4, 5)).evalf(5) == Float('40.841', '5') + assert SingularityFunction(6.1, pi, 2) == (-pi + 6.1)**2 + assert SingularityFunction(x, a, nan) is nan + assert SingularityFunction(x, nan, 1) is nan + assert SingularityFunction(nan, a, n) is nan + + raises(ValueError, lambda: SingularityFunction(x, a, I)) + raises(ValueError, lambda: SingularityFunction(2*I, I, n)) + raises(ValueError, lambda: SingularityFunction(x, a, -5)) + + +def test_leading_term(): + l = Symbol('l', positive=True) + assert SingularityFunction(x, 3, 2).as_leading_term(x) == 0 + assert SingularityFunction(x, -2, 1).as_leading_term(x) == 2 + assert SingularityFunction(x, 0, 0).as_leading_term(x) == 1 + assert SingularityFunction(x, 0, 0).as_leading_term(x, cdir=-1) == 0 + assert SingularityFunction(x, 0, -1).as_leading_term(x) == 0 + assert SingularityFunction(x, 0, -2).as_leading_term(x) == 0 + assert SingularityFunction(x, 0, -3).as_leading_term(x) == 0 + assert SingularityFunction(x, 0, -4).as_leading_term(x) == 0 + assert (SingularityFunction(x + l, 0, 1)/2\ + - SingularityFunction(x + l, l/2, 1)\ + + SingularityFunction(x + l, l, 1)/2).as_leading_term(x) == -x/2 + + +def test_series(): + l = Symbol('l', positive=True) + assert SingularityFunction(x, -3, 2).series(x) == x**2 + 6*x + 9 + assert SingularityFunction(x, -2, 1).series(x) == x + 2 + assert SingularityFunction(x, 0, 0).series(x) == 1 + assert SingularityFunction(x, 0, 0).series(x, dir='-') == 0 + assert SingularityFunction(x, 0, -1).series(x) == 0 + assert SingularityFunction(x, 0, -2).series(x) == 0 + assert SingularityFunction(x, 0, -3).series(x) == 0 + assert SingularityFunction(x, 0, -4).series(x) == 0 + assert (SingularityFunction(x + l, 0, 1)/2\ + - SingularityFunction(x + l, l/2, 1)\ + + SingularityFunction(x + l, l, 1)/2).nseries(x) == -x/2 + O(x**6) + + +def test_rewrite(): + assert SingularityFunction(x, 4, 5).rewrite(Piecewise) == ( + Piecewise(((x - 4)**5, x - 4 >= 0), (0, True))) + assert SingularityFunction(x, -10, 0).rewrite(Piecewise) == ( + Piecewise((1, x + 10 >= 0), (0, True))) + assert SingularityFunction(x, 2, -1).rewrite(Piecewise) == ( + Piecewise((oo, Eq(x - 2, 0)), (0, True))) + assert SingularityFunction(x, 0, -2).rewrite(Piecewise) == ( + Piecewise((oo, Eq(x, 0)), (0, True))) + + n = Symbol('n', nonnegative=True) + p = SingularityFunction(x, a, n).rewrite(Piecewise) + assert p == ( + Piecewise(((x - a)**n, x - a >= 0), (0, True))) + assert p.subs(x, a).subs(n, 0) == 1 + + expr_in = SingularityFunction(x, 4, 5) + SingularityFunction(x, -3, -1) - SingularityFunction(x, 0, -2) + expr_out = (x - 4)**5*Heaviside(x - 4, 1) + DiracDelta(x + 3) - DiracDelta(x, 1) + assert expr_in.rewrite(Heaviside) == expr_out + assert expr_in.rewrite(DiracDelta) == expr_out + assert expr_in.rewrite('HeavisideDiracDelta') == expr_out + + expr_in = SingularityFunction(x, a, n) + SingularityFunction(x, a, -1) - SingularityFunction(x, a, -2) + expr_out = (x - a)**n*Heaviside(x - a, 1) + DiracDelta(x - a) + DiracDelta(a - x, 1) + assert expr_in.rewrite(Heaviside) == expr_out + assert expr_in.rewrite(DiracDelta) == expr_out + assert expr_in.rewrite('HeavisideDiracDelta') == expr_out diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spec_polynomials.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spec_polynomials.py new file mode 100644 index 0000000000000000000000000000000000000000..584ad3cf97df8b9d92da9fc7805ab4296f40671c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spec_polynomials.py @@ -0,0 +1,475 @@ +from sympy.concrete.summations import Sum +from sympy.core.function import (Derivative, diff) +from sympy.core.numbers import (Rational, oo, pi, zoo) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.combinatorial.factorials import (RisingFactorial, binomial, factorial) +from sympy.functions.elementary.complexes import conjugate +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import cos +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import hyper +from sympy.functions.special.polynomials import (assoc_laguerre, assoc_legendre, chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root, gegenbauer, hermite, hermite_prob, jacobi, jacobi_normalized, laguerre, legendre) +from sympy.polys.orthopolys import laguerre_poly +from sympy.polys.polyroots import roots + +from sympy.core.expr import unchanged +from sympy.core.function import ArgumentIndexError +from sympy.testing.pytest import raises + + +x = Symbol('x') + + +def test_jacobi(): + n = Symbol("n") + a = Symbol("a") + b = Symbol("b") + + assert jacobi(0, a, b, x) == 1 + assert jacobi(1, a, b, x) == a/2 - b/2 + x*(a/2 + b/2 + 1) + + assert jacobi(n, a, a, x) == RisingFactorial( + a + 1, n)*gegenbauer(n, a + S.Half, x)/RisingFactorial(2*a + 1, n) + assert jacobi(n, a, -a, x) == ((-1)**a*(-x + 1)**(-a/2)*(x + 1)**(a/2)*assoc_legendre(n, a, x)* + factorial(-a + n)*gamma(a + n + 1)/(factorial(a + n)*gamma(n + 1))) + assert jacobi(n, -b, b, x) == ((-x + 1)**(b/2)*(x + 1)**(-b/2)*assoc_legendre(n, b, x)* + gamma(-b + n + 1)/gamma(n + 1)) + assert jacobi(n, 0, 0, x) == legendre(n, x) + assert jacobi(n, S.Half, S.Half, x) == RisingFactorial( + Rational(3, 2), n)*chebyshevu(n, x)/factorial(n + 1) + assert jacobi(n, Rational(-1, 2), Rational(-1, 2), x) == RisingFactorial( + S.Half, n)*chebyshevt(n, x)/factorial(n) + + X = jacobi(n, a, b, x) + assert isinstance(X, jacobi) + + assert jacobi(n, a, b, -x) == (-1)**n*jacobi(n, b, a, x) + assert jacobi(n, a, b, 0) == 2**(-n)*gamma(a + n + 1)*hyper( + (-b - n, -n), (a + 1,), -1)/(factorial(n)*gamma(a + 1)) + assert jacobi(n, a, b, 1) == RisingFactorial(a + 1, n)/factorial(n) + + m = Symbol("m", positive=True) + assert jacobi(m, a, b, oo) == oo*RisingFactorial(a + b + m + 1, m) + assert unchanged(jacobi, n, a, b, oo) + + assert conjugate(jacobi(m, a, b, x)) == \ + jacobi(m, conjugate(a), conjugate(b), conjugate(x)) + + _k = Dummy('k') + assert diff(jacobi(n, a, b, x), n) == Derivative(jacobi(n, a, b, x), n) + assert diff(jacobi(n, a, b, x), a).dummy_eq(Sum((jacobi(n, a, b, x) + + (2*_k + a + b + 1)*RisingFactorial(_k + b + 1, -_k + n)*jacobi(_k, a, + b, x)/((-_k + n)*RisingFactorial(_k + a + b + 1, -_k + n)))/(_k + a + + b + n + 1), (_k, 0, n - 1))) + assert diff(jacobi(n, a, b, x), b).dummy_eq(Sum(((-1)**(-_k + n)*(2*_k + + a + b + 1)*RisingFactorial(_k + a + 1, -_k + n)*jacobi(_k, a, b, x)/ + ((-_k + n)*RisingFactorial(_k + a + b + 1, -_k + n)) + jacobi(n, a, + b, x))/(_k + a + b + n + 1), (_k, 0, n - 1))) + assert diff(jacobi(n, a, b, x), x) == \ + (a/2 + b/2 + n/2 + S.Half)*jacobi(n - 1, a + 1, b + 1, x) + + assert jacobi_normalized(n, a, b, x) == \ + (jacobi(n, a, b, x)/sqrt(2**(a + b + 1)*gamma(a + n + 1)*gamma(b + n + 1) + /((a + b + 2*n + 1)*factorial(n)*gamma(a + b + n + 1)))) + + raises(ValueError, lambda: jacobi(-2.1, a, b, x)) + raises(ValueError, lambda: jacobi(Dummy(positive=True, integer=True), 1, 2, oo)) + + assert jacobi(n, a, b, x).rewrite(Sum).dummy_eq(Sum((S.Half - x/2) + **_k*RisingFactorial(-n, _k)*RisingFactorial(_k + a + 1, -_k + n)* + RisingFactorial(a + b + n + 1, _k)/factorial(_k), (_k, 0, n))/factorial(n)) + assert jacobi(n, a, b, x).rewrite("polynomial").dummy_eq(Sum((S.Half - x/2) + **_k*RisingFactorial(-n, _k)*RisingFactorial(_k + a + 1, -_k + n)* + RisingFactorial(a + b + n + 1, _k)/factorial(_k), (_k, 0, n))/factorial(n)) + raises(ArgumentIndexError, lambda: jacobi(n, a, b, x).fdiff(5)) + + +def test_gegenbauer(): + n = Symbol("n") + a = Symbol("a") + + assert gegenbauer(0, a, x) == 1 + assert gegenbauer(1, a, x) == 2*a*x + assert gegenbauer(2, a, x) == -a + x**2*(2*a**2 + 2*a) + assert gegenbauer(3, a, x) == \ + x**3*(4*a**3/3 + 4*a**2 + a*Rational(8, 3)) + x*(-2*a**2 - 2*a) + + assert gegenbauer(-1, a, x) == 0 + assert gegenbauer(n, S.Half, x) == legendre(n, x) + assert gegenbauer(n, 1, x) == chebyshevu(n, x) + assert gegenbauer(n, -1, x) == 0 + + X = gegenbauer(n, a, x) + assert isinstance(X, gegenbauer) + + assert gegenbauer(n, a, -x) == (-1)**n*gegenbauer(n, a, x) + assert gegenbauer(n, a, 0) == 2**n*sqrt(pi) * \ + gamma(a + n/2)/(gamma(a)*gamma(-n/2 + S.Half)*gamma(n + 1)) + assert gegenbauer(n, a, 1) == gamma(2*a + n)/(gamma(2*a)*gamma(n + 1)) + + assert gegenbauer(n, Rational(3, 4), -1) is zoo + assert gegenbauer(n, Rational(1, 4), -1) == (sqrt(2)*cos(pi*(n + S.One/4))* + gamma(n + S.Half)/(sqrt(pi)*gamma(n + 1))) + + m = Symbol("m", positive=True) + assert gegenbauer(m, a, oo) == oo*RisingFactorial(a, m) + assert unchanged(gegenbauer, n, a, oo) + + assert conjugate(gegenbauer(n, a, x)) == gegenbauer(n, conjugate(a), conjugate(x)) + + _k = Dummy('k') + + assert diff(gegenbauer(n, a, x), n) == Derivative(gegenbauer(n, a, x), n) + assert diff(gegenbauer(n, a, x), a).dummy_eq(Sum((2*(-1)**(-_k + n) + 2)* + (_k + a)*gegenbauer(_k, a, x)/((-_k + n)*(_k + 2*a + n)) + ((2*_k + + 2)/((_k + 2*a)*(2*_k + 2*a + 1)) + 2/(_k + 2*a + n))*gegenbauer(n, a + , x), (_k, 0, n - 1))) + assert diff(gegenbauer(n, a, x), x) == 2*a*gegenbauer(n - 1, a + 1, x) + + assert gegenbauer(n, a, x).rewrite(Sum).dummy_eq( + Sum((-1)**_k*(2*x)**(-2*_k + n)*RisingFactorial(a, -_k + n) + /(factorial(_k)*factorial(-2*_k + n)), (_k, 0, floor(n/2)))) + assert gegenbauer(n, a, x).rewrite("polynomial").dummy_eq( + Sum((-1)**_k*(2*x)**(-2*_k + n)*RisingFactorial(a, -_k + n) + /(factorial(_k)*factorial(-2*_k + n)), (_k, 0, floor(n/2)))) + + raises(ArgumentIndexError, lambda: gegenbauer(n, a, x).fdiff(4)) + + +def test_legendre(): + assert legendre(0, x) == 1 + assert legendre(1, x) == x + assert legendre(2, x) == ((3*x**2 - 1)/2).expand() + assert legendre(3, x) == ((5*x**3 - 3*x)/2).expand() + assert legendre(4, x) == ((35*x**4 - 30*x**2 + 3)/8).expand() + assert legendre(5, x) == ((63*x**5 - 70*x**3 + 15*x)/8).expand() + assert legendre(6, x) == ((231*x**6 - 315*x**4 + 105*x**2 - 5)/16).expand() + + assert legendre(10, -1) == 1 + assert legendre(11, -1) == -1 + assert legendre(10, 1) == 1 + assert legendre(11, 1) == 1 + assert legendre(10, 0) != 0 + assert legendre(11, 0) == 0 + + assert legendre(-1, x) == 1 + k = Symbol('k') + assert legendre(5 - k, x).subs(k, 2) == ((5*x**3 - 3*x)/2).expand() + + assert roots(legendre(4, x), x) == { + sqrt(Rational(3, 7) - Rational(2, 35)*sqrt(30)): 1, + -sqrt(Rational(3, 7) - Rational(2, 35)*sqrt(30)): 1, + sqrt(Rational(3, 7) + Rational(2, 35)*sqrt(30)): 1, + -sqrt(Rational(3, 7) + Rational(2, 35)*sqrt(30)): 1, + } + + n = Symbol("n") + + X = legendre(n, x) + assert isinstance(X, legendre) + assert unchanged(legendre, n, x) + + assert legendre(n, 0) == sqrt(pi)/(gamma(S.Half - n/2)*gamma(n/2 + 1)) + assert legendre(n, 1) == 1 + assert legendre(n, oo) is oo + assert legendre(-n, x) == legendre(n - 1, x) + assert legendre(n, -x) == (-1)**n*legendre(n, x) + assert unchanged(legendre, -n + k, x) + + assert conjugate(legendre(n, x)) == legendre(n, conjugate(x)) + + assert diff(legendre(n, x), x) == \ + n*(x*legendre(n, x) - legendre(n - 1, x))/(x**2 - 1) + assert diff(legendre(n, x), n) == Derivative(legendre(n, x), n) + + _k = Dummy('k') + assert legendre(n, x).rewrite(Sum).dummy_eq(Sum((-1)**_k*(S.Half - + x/2)**_k*(x/2 + S.Half)**(-_k + n)*binomial(n, _k)**2, (_k, 0, n))) + assert legendre(n, x).rewrite("polynomial").dummy_eq(Sum((-1)**_k*(S.Half - + x/2)**_k*(x/2 + S.Half)**(-_k + n)*binomial(n, _k)**2, (_k, 0, n))) + raises(ArgumentIndexError, lambda: legendre(n, x).fdiff(1)) + raises(ArgumentIndexError, lambda: legendre(n, x).fdiff(3)) + + +def test_assoc_legendre(): + Plm = assoc_legendre + Q = sqrt(1 - x**2) + + assert Plm(0, 0, x) == 1 + assert Plm(1, 0, x) == x + assert Plm(1, 1, x) == -Q + assert Plm(2, 0, x) == (3*x**2 - 1)/2 + assert Plm(2, 1, x) == -3*x*Q + assert Plm(2, 2, x) == 3*Q**2 + assert Plm(3, 0, x) == (5*x**3 - 3*x)/2 + assert Plm(3, 1, x).expand() == (( 3*(1 - 5*x**2)/2 ).expand() * Q).expand() + assert Plm(3, 2, x) == 15*x * Q**2 + assert Plm(3, 3, x) == -15 * Q**3 + + # negative m + assert Plm(1, -1, x) == -Plm(1, 1, x)/2 + assert Plm(2, -2, x) == Plm(2, 2, x)/24 + assert Plm(2, -1, x) == -Plm(2, 1, x)/6 + assert Plm(3, -3, x) == -Plm(3, 3, x)/720 + assert Plm(3, -2, x) == Plm(3, 2, x)/120 + assert Plm(3, -1, x) == -Plm(3, 1, x)/12 + + n = Symbol("n") + m = Symbol("m") + X = Plm(n, m, x) + assert isinstance(X, assoc_legendre) + + assert Plm(n, 0, x) == legendre(n, x) + assert Plm(n, m, 0) == 2**m*sqrt(pi)/(gamma(-m/2 - n/2 + + S.Half)*gamma(-m/2 + n/2 + 1)) + + assert diff(Plm(m, n, x), x) == (m*x*assoc_legendre(m, n, x) - + (m + n)*assoc_legendre(m - 1, n, x))/(x**2 - 1) + + _k = Dummy('k') + assert Plm(m, n, x).rewrite(Sum).dummy_eq( + (1 - x**2)**(n/2)*Sum((-1)**_k*2**(-m)*x**(-2*_k + m - n)*factorial + (-2*_k + 2*m)/(factorial(_k)*factorial(-_k + m)*factorial(-2*_k + m + - n)), (_k, 0, floor(m/2 - n/2)))) + assert Plm(m, n, x).rewrite("polynomial").dummy_eq( + (1 - x**2)**(n/2)*Sum((-1)**_k*2**(-m)*x**(-2*_k + m - n)*factorial + (-2*_k + 2*m)/(factorial(_k)*factorial(-_k + m)*factorial(-2*_k + m + - n)), (_k, 0, floor(m/2 - n/2)))) + assert conjugate(assoc_legendre(n, m, x)) == \ + assoc_legendre(n, conjugate(m), conjugate(x)) + raises(ValueError, lambda: Plm(0, 1, x)) + raises(ValueError, lambda: Plm(-1, 1, x)) + raises(ArgumentIndexError, lambda: Plm(n, m, x).fdiff(1)) + raises(ArgumentIndexError, lambda: Plm(n, m, x).fdiff(2)) + raises(ArgumentIndexError, lambda: Plm(n, m, x).fdiff(4)) + + +def test_chebyshev(): + assert chebyshevt(0, x) == 1 + assert chebyshevt(1, x) == x + assert chebyshevt(2, x) == 2*x**2 - 1 + assert chebyshevt(3, x) == 4*x**3 - 3*x + + for n in range(1, 4): + for k in range(n): + z = chebyshevt_root(n, k) + assert chebyshevt(n, z) == 0 + raises(ValueError, lambda: chebyshevt_root(n, n)) + + for n in range(1, 4): + for k in range(n): + z = chebyshevu_root(n, k) + assert chebyshevu(n, z) == 0 + raises(ValueError, lambda: chebyshevu_root(n, n)) + + n = Symbol("n") + X = chebyshevt(n, x) + assert isinstance(X, chebyshevt) + assert unchanged(chebyshevt, n, x) + assert chebyshevt(n, -x) == (-1)**n*chebyshevt(n, x) + assert chebyshevt(-n, x) == chebyshevt(n, x) + + assert chebyshevt(n, 0) == cos(pi*n/2) + assert chebyshevt(n, 1) == 1 + assert chebyshevt(n, oo) is oo + + assert conjugate(chebyshevt(n, x)) == chebyshevt(n, conjugate(x)) + + assert diff(chebyshevt(n, x), x) == n*chebyshevu(n - 1, x) + + X = chebyshevu(n, x) + assert isinstance(X, chebyshevu) + + y = Symbol('y') + assert chebyshevu(n, -x) == (-1)**n*chebyshevu(n, x) + assert chebyshevu(-n, x) == -chebyshevu(n - 2, x) + assert unchanged(chebyshevu, -n + y, x) + + assert chebyshevu(n, 0) == cos(pi*n/2) + assert chebyshevu(n, 1) == n + 1 + assert chebyshevu(n, oo) is oo + + assert conjugate(chebyshevu(n, x)) == chebyshevu(n, conjugate(x)) + + assert diff(chebyshevu(n, x), x) == \ + (-x*chebyshevu(n, x) + (n + 1)*chebyshevt(n + 1, x))/(x**2 - 1) + + _k = Dummy('k') + assert chebyshevt(n, x).rewrite(Sum).dummy_eq(Sum(x**(-2*_k + n) + *(x**2 - 1)**_k*binomial(n, 2*_k), (_k, 0, floor(n/2)))) + assert chebyshevt(n, x).rewrite("polynomial").dummy_eq(Sum(x**(-2*_k + n) + *(x**2 - 1)**_k*binomial(n, 2*_k), (_k, 0, floor(n/2)))) + assert chebyshevu(n, x).rewrite(Sum).dummy_eq(Sum((-1)**_k*(2*x) + **(-2*_k + n)*factorial(-_k + n)/(factorial(_k)* + factorial(-2*_k + n)), (_k, 0, floor(n/2)))) + assert chebyshevu(n, x).rewrite("polynomial").dummy_eq(Sum((-1)**_k*(2*x) + **(-2*_k + n)*factorial(-_k + n)/(factorial(_k)* + factorial(-2*_k + n)), (_k, 0, floor(n/2)))) + raises(ArgumentIndexError, lambda: chebyshevt(n, x).fdiff(1)) + raises(ArgumentIndexError, lambda: chebyshevt(n, x).fdiff(3)) + raises(ArgumentIndexError, lambda: chebyshevu(n, x).fdiff(1)) + raises(ArgumentIndexError, lambda: chebyshevu(n, x).fdiff(3)) + + +def test_hermite(): + assert hermite(0, x) == 1 + assert hermite(1, x) == 2*x + assert hermite(2, x) == 4*x**2 - 2 + assert hermite(3, x) == 8*x**3 - 12*x + assert hermite(4, x) == 16*x**4 - 48*x**2 + 12 + assert hermite(6, x) == 64*x**6 - 480*x**4 + 720*x**2 - 120 + + n = Symbol("n") + assert unchanged(hermite, n, x) + assert hermite(n, -x) == (-1)**n*hermite(n, x) + assert unchanged(hermite, -n, x) + + assert hermite(n, 0) == 2**n*sqrt(pi)/gamma(S.Half - n/2) + assert hermite(n, oo) is oo + + assert conjugate(hermite(n, x)) == hermite(n, conjugate(x)) + + _k = Dummy('k') + assert hermite(n, x).rewrite(Sum).dummy_eq(factorial(n)*Sum((-1) + **_k*(2*x)**(-2*_k + n)/(factorial(_k)*factorial(-2*_k + n)), (_k, + 0, floor(n/2)))) + assert hermite(n, x).rewrite("polynomial").dummy_eq(factorial(n)*Sum((-1) + **_k*(2*x)**(-2*_k + n)/(factorial(_k)*factorial(-2*_k + n)), (_k, + 0, floor(n/2)))) + + assert diff(hermite(n, x), x) == 2*n*hermite(n - 1, x) + assert diff(hermite(n, x), n) == Derivative(hermite(n, x), n) + raises(ArgumentIndexError, lambda: hermite(n, x).fdiff(3)) + + assert hermite(n, x).rewrite(hermite_prob) == \ + sqrt(2)**n * hermite_prob(n, x*sqrt(2)) + + +def test_hermite_prob(): + assert hermite_prob(0, x) == 1 + assert hermite_prob(1, x) == x + assert hermite_prob(2, x) == x**2 - 1 + assert hermite_prob(3, x) == x**3 - 3*x + assert hermite_prob(4, x) == x**4 - 6*x**2 + 3 + assert hermite_prob(6, x) == x**6 - 15*x**4 + 45*x**2 - 15 + + n = Symbol("n") + assert unchanged(hermite_prob, n, x) + assert hermite_prob(n, -x) == (-1)**n*hermite_prob(n, x) + assert unchanged(hermite_prob, -n, x) + + assert hermite_prob(n, 0) == sqrt(pi)/gamma(S.Half - n/2) + assert hermite_prob(n, oo) is oo + + assert conjugate(hermite_prob(n, x)) == hermite_prob(n, conjugate(x)) + + _k = Dummy('k') + assert hermite_prob(n, x).rewrite(Sum).dummy_eq(factorial(n) * + Sum((-S.Half)**_k * x**(n-2*_k) / (factorial(_k) * factorial(n-2*_k)), + (_k, 0, floor(n/2)))) + assert hermite_prob(n, x).rewrite("polynomial").dummy_eq(factorial(n) * + Sum((-S.Half)**_k * x**(n-2*_k) / (factorial(_k) * factorial(n-2*_k)), + (_k, 0, floor(n/2)))) + + assert diff(hermite_prob(n, x), x) == n*hermite_prob(n-1, x) + assert diff(hermite_prob(n, x), n) == Derivative(hermite_prob(n, x), n) + raises(ArgumentIndexError, lambda: hermite_prob(n, x).fdiff(3)) + + assert hermite_prob(n, x).rewrite(hermite) == \ + sqrt(2)**(-n) * hermite(n, x/sqrt(2)) + + +def test_laguerre(): + n = Symbol("n") + m = Symbol("m", negative=True) + + # Laguerre polynomials: + assert laguerre(0, x) == 1 + assert laguerre(1, x) == -x + 1 + assert laguerre(2, x) == x**2/2 - 2*x + 1 + assert laguerre(3, x) == -x**3/6 + 3*x**2/2 - 3*x + 1 + assert laguerre(-2, x) == (x + 1)*exp(x) + + X = laguerre(n, x) + assert isinstance(X, laguerre) + + assert laguerre(n, 0) == 1 + assert laguerre(n, oo) == (-1)**n*oo + assert laguerre(n, -oo) is oo + + assert conjugate(laguerre(n, x)) == laguerre(n, conjugate(x)) + + _k = Dummy('k') + + assert laguerre(n, x).rewrite(Sum).dummy_eq( + Sum(x**_k*RisingFactorial(-n, _k)/factorial(_k)**2, (_k, 0, n))) + assert laguerre(n, x).rewrite("polynomial").dummy_eq( + Sum(x**_k*RisingFactorial(-n, _k)/factorial(_k)**2, (_k, 0, n))) + assert laguerre(m, x).rewrite(Sum).dummy_eq( + exp(x)*Sum((-x)**_k*RisingFactorial(m + 1, _k)/factorial(_k)**2, + (_k, 0, -m - 1))) + assert laguerre(m, x).rewrite("polynomial").dummy_eq( + exp(x)*Sum((-x)**_k*RisingFactorial(m + 1, _k)/factorial(_k)**2, + (_k, 0, -m - 1))) + + assert diff(laguerre(n, x), x) == -assoc_laguerre(n - 1, 1, x) + + k = Symbol('k') + assert laguerre(-n, x) == exp(x)*laguerre(n - 1, -x) + assert laguerre(-3, x) == exp(x)*laguerre(2, -x) + assert unchanged(laguerre, -n + k, x) + + raises(ValueError, lambda: laguerre(-2.1, x)) + raises(ValueError, lambda: laguerre(Rational(5, 2), x)) + raises(ArgumentIndexError, lambda: laguerre(n, x).fdiff(1)) + raises(ArgumentIndexError, lambda: laguerre(n, x).fdiff(3)) + + +def test_assoc_laguerre(): + n = Symbol("n") + m = Symbol("m") + alpha = Symbol("alpha") + + # generalized Laguerre polynomials: + assert assoc_laguerre(0, alpha, x) == 1 + assert assoc_laguerre(1, alpha, x) == -x + alpha + 1 + assert assoc_laguerre(2, alpha, x).expand() == \ + (x**2/2 - (alpha + 2)*x + (alpha + 2)*(alpha + 1)/2).expand() + assert assoc_laguerre(3, alpha, x).expand() == \ + (-x**3/6 + (alpha + 3)*x**2/2 - (alpha + 2)*(alpha + 3)*x/2 + + (alpha + 1)*(alpha + 2)*(alpha + 3)/6).expand() + + # Test the lowest 10 polynomials with laguerre_poly, to make sure it works: + for i in range(10): + assert assoc_laguerre(i, 0, x).expand() == laguerre_poly(i, x) + + X = assoc_laguerre(n, m, x) + assert isinstance(X, assoc_laguerre) + + assert assoc_laguerre(n, 0, x) == laguerre(n, x) + assert assoc_laguerre(n, alpha, 0) == binomial(alpha + n, alpha) + p = Symbol("p", positive=True) + assert assoc_laguerre(p, alpha, oo) == (-1)**p*oo + assert assoc_laguerre(p, alpha, -oo) is oo + + assert diff(assoc_laguerre(n, alpha, x), x) == \ + -assoc_laguerre(n - 1, alpha + 1, x) + _k = Dummy('k') + assert diff(assoc_laguerre(n, alpha, x), alpha).dummy_eq( + Sum(assoc_laguerre(_k, alpha, x)/(-alpha + n), (_k, 0, n - 1))) + + assert conjugate(assoc_laguerre(n, alpha, x)) == \ + assoc_laguerre(n, conjugate(alpha), conjugate(x)) + + assert assoc_laguerre(n, alpha, x).rewrite(Sum).dummy_eq( + gamma(alpha + n + 1)*Sum(x**_k*RisingFactorial(-n, _k)/ + (factorial(_k)*gamma(_k + alpha + 1)), (_k, 0, n))/factorial(n)) + assert assoc_laguerre(n, alpha, x).rewrite("polynomial").dummy_eq( + gamma(alpha + n + 1)*Sum(x**_k*RisingFactorial(-n, _k)/ + (factorial(_k)*gamma(_k + alpha + 1)), (_k, 0, n))/factorial(n)) + raises(ValueError, lambda: assoc_laguerre(-2.1, alpha, x)) + raises(ArgumentIndexError, lambda: assoc_laguerre(n, alpha, x).fdiff(1)) + raises(ArgumentIndexError, lambda: assoc_laguerre(n, alpha, x).fdiff(4)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spherical_harmonics.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spherical_harmonics.py new file mode 100644 index 0000000000000000000000000000000000000000..2e0d4ffebabb62c13d3fc2996e8ba23866467720 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_spherical_harmonics.py @@ -0,0 +1,66 @@ +from sympy.core.function import diff +from sympy.core.numbers import (I, pi) +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import conjugate +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, cot, sin) +from sympy.functions.special.spherical_harmonics import Ynm, Znm, Ynm_c + + +def test_Ynm(): + # https://en.wikipedia.org/wiki/Spherical_harmonics + th, ph = Symbol("theta", real=True), Symbol("phi", real=True) + from sympy.abc import n,m + + assert Ynm(0, 0, th, ph).expand(func=True) == 1/(2*sqrt(pi)) + assert Ynm(1, -1, th, ph) == -exp(-2*I*ph)*Ynm(1, 1, th, ph) + assert Ynm(1, -1, th, ph).expand(func=True) == sqrt(6)*sin(th)*exp(-I*ph)/(4*sqrt(pi)) + assert Ynm(1, 0, th, ph).expand(func=True) == sqrt(3)*cos(th)/(2*sqrt(pi)) + assert Ynm(1, 1, th, ph).expand(func=True) == -sqrt(6)*sin(th)*exp(I*ph)/(4*sqrt(pi)) + assert Ynm(2, 0, th, ph).expand(func=True) == 3*sqrt(5)*cos(th)**2/(4*sqrt(pi)) - sqrt(5)/(4*sqrt(pi)) + assert Ynm(2, 1, th, ph).expand(func=True) == -sqrt(30)*sin(th)*exp(I*ph)*cos(th)/(4*sqrt(pi)) + assert Ynm(2, -2, th, ph).expand(func=True) == (-sqrt(30)*exp(-2*I*ph)*cos(th)**2/(8*sqrt(pi)) + + sqrt(30)*exp(-2*I*ph)/(8*sqrt(pi))) + assert Ynm(2, 2, th, ph).expand(func=True) == (-sqrt(30)*exp(2*I*ph)*cos(th)**2/(8*sqrt(pi)) + + sqrt(30)*exp(2*I*ph)/(8*sqrt(pi))) + + assert diff(Ynm(n, m, th, ph), th) == (m*cot(th)*Ynm(n, m, th, ph) + + sqrt((-m + n)*(m + n + 1))*exp(-I*ph)*Ynm(n, m + 1, th, ph)) + assert diff(Ynm(n, m, th, ph), ph) == I*m*Ynm(n, m, th, ph) + + assert conjugate(Ynm(n, m, th, ph)) == (-1)**(2*m)*exp(-2*I*m*ph)*Ynm(n, m, th, ph) + + assert Ynm(n, m, -th, ph) == Ynm(n, m, th, ph) + assert Ynm(n, m, th, -ph) == exp(-2*I*m*ph)*Ynm(n, m, th, ph) + assert Ynm(n, -m, th, ph) == (-1)**m*exp(-2*I*m*ph)*Ynm(n, m, th, ph) + + +def test_Ynm_c(): + th, ph = Symbol("theta", real=True), Symbol("phi", real=True) + from sympy.abc import n,m + + assert Ynm_c(n, m, th, ph) == (-1)**(2*m)*exp(-2*I*m*ph)*Ynm(n, m, th, ph) + + +def test_Znm(): + # https://en.wikipedia.org/wiki/Solid_harmonics#List_of_lowest_functions + th, ph = Symbol("theta", real=True), Symbol("phi", real=True) + + assert Znm(0, 0, th, ph) == Ynm(0, 0, th, ph) + assert Znm(1, -1, th, ph) == (-sqrt(2)*I*(Ynm(1, 1, th, ph) + - exp(-2*I*ph)*Ynm(1, 1, th, ph))/2) + assert Znm(1, 0, th, ph) == Ynm(1, 0, th, ph) + assert Znm(1, 1, th, ph) == (sqrt(2)*(Ynm(1, 1, th, ph) + + exp(-2*I*ph)*Ynm(1, 1, th, ph))/2) + assert Znm(0, 0, th, ph).expand(func=True) == 1/(2*sqrt(pi)) + assert Znm(1, -1, th, ph).expand(func=True) == (sqrt(3)*I*sin(th)*exp(I*ph)/(4*sqrt(pi)) + - sqrt(3)*I*sin(th)*exp(-I*ph)/(4*sqrt(pi))) + assert Znm(1, 0, th, ph).expand(func=True) == sqrt(3)*cos(th)/(2*sqrt(pi)) + assert Znm(1, 1, th, ph).expand(func=True) == (-sqrt(3)*sin(th)*exp(I*ph)/(4*sqrt(pi)) + - sqrt(3)*sin(th)*exp(-I*ph)/(4*sqrt(pi))) + assert Znm(2, -1, th, ph).expand(func=True) == (sqrt(15)*I*sin(th)*exp(I*ph)*cos(th)/(4*sqrt(pi)) + - sqrt(15)*I*sin(th)*exp(-I*ph)*cos(th)/(4*sqrt(pi))) + assert Znm(2, 0, th, ph).expand(func=True) == 3*sqrt(5)*cos(th)**2/(4*sqrt(pi)) - sqrt(5)/(4*sqrt(pi)) + assert Znm(2, 1, th, ph).expand(func=True) == (-sqrt(15)*sin(th)*exp(I*ph)*cos(th)/(4*sqrt(pi)) + - sqrt(15)*sin(th)*exp(-I*ph)*cos(th)/(4*sqrt(pi))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_tensor_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_tensor_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..7d4f31c45ae0a60a6f72dc5551794b2110f5ab99 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_tensor_functions.py @@ -0,0 +1,145 @@ +from sympy.core.relational import Ne +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.elementary.complexes import (adjoint, conjugate, transpose) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.tensor_functions import (Eijk, KroneckerDelta, LeviCivita) + +from sympy.physics.secondquant import evaluate_deltas, F + +x, y = symbols('x y') + + +def test_levicivita(): + assert Eijk(1, 2, 3) == LeviCivita(1, 2, 3) + assert LeviCivita(1, 2, 3) == 1 + assert LeviCivita(int(1), int(2), int(3)) == 1 + assert LeviCivita(1, 3, 2) == -1 + assert LeviCivita(1, 2, 2) == 0 + i, j, k = symbols('i j k') + assert LeviCivita(i, j, k) == LeviCivita(i, j, k, evaluate=False) + assert LeviCivita(i, j, i) == 0 + assert LeviCivita(1, i, i) == 0 + assert LeviCivita(i, j, k).doit() == (j - i)*(k - i)*(k - j)/2 + assert LeviCivita(1, 2, 3, 1) == 0 + assert LeviCivita(4, 5, 1, 2, 3) == 1 + assert LeviCivita(4, 5, 2, 1, 3) == -1 + + assert LeviCivita(i, j, k).is_integer is True + + assert adjoint(LeviCivita(i, j, k)) == LeviCivita(i, j, k) + assert conjugate(LeviCivita(i, j, k)) == LeviCivita(i, j, k) + assert transpose(LeviCivita(i, j, k)) == LeviCivita(i, j, k) + + +def test_kronecker_delta(): + i, j = symbols('i j') + k = Symbol('k', nonzero=True) + assert KroneckerDelta(1, 1) == 1 + assert KroneckerDelta(1, 2) == 0 + assert KroneckerDelta(k, 0) == 0 + assert KroneckerDelta(x, x) == 1 + assert KroneckerDelta(x**2 - y**2, x**2 - y**2) == 1 + assert KroneckerDelta(i, i) == 1 + assert KroneckerDelta(i, i + 1) == 0 + assert KroneckerDelta(0, 0) == 1 + assert KroneckerDelta(0, 1) == 0 + assert KroneckerDelta(i + k, i) == 0 + assert KroneckerDelta(i + k, i + k) == 1 + assert KroneckerDelta(i + k, i + 1 + k) == 0 + assert KroneckerDelta(i, j).subs({"i": 1, "j": 0}) == 0 + assert KroneckerDelta(i, j).subs({"i": 3, "j": 3}) == 1 + + assert KroneckerDelta(i, j)**0 == 1 + for n in range(1, 10): + assert KroneckerDelta(i, j)**n == KroneckerDelta(i, j) + assert KroneckerDelta(i, j)**-n == 1/KroneckerDelta(i, j) + + assert KroneckerDelta(i, j).is_integer is True + + assert adjoint(KroneckerDelta(i, j)) == KroneckerDelta(i, j) + assert conjugate(KroneckerDelta(i, j)) == KroneckerDelta(i, j) + assert transpose(KroneckerDelta(i, j)) == KroneckerDelta(i, j) + # to test if canonical + assert (KroneckerDelta(i, j) == KroneckerDelta(j, i)) == True + + assert KroneckerDelta(i, j).rewrite(Piecewise) == Piecewise((0, Ne(i, j)), (1, True)) + + # Tests with range: + assert KroneckerDelta(i, j, (0, i)).args == (i, j, (0, i)) + assert KroneckerDelta(i, j, (-j, i)).delta_range == (-j, i) + + # If index is out of range, return zero: + assert KroneckerDelta(i, j, (0, i-1)) == 0 + assert KroneckerDelta(-1, j, (0, i-1)) == 0 + assert KroneckerDelta(j, -1, (0, i-1)) == 0 + assert KroneckerDelta(j, i, (0, i-1)) == 0 + + +def test_kronecker_delta_secondquant(): + """secondquant-specific methods""" + D = KroneckerDelta + i, j, v, w = symbols('i j v w', below_fermi=True, cls=Dummy) + a, b, t, u = symbols('a b t u', above_fermi=True, cls=Dummy) + p, q, r, s = symbols('p q r s', cls=Dummy) + + assert D(i, a) == 0 + assert D(i, t) == 0 + + assert D(i, j).is_above_fermi is False + assert D(a, b).is_above_fermi is True + assert D(p, q).is_above_fermi is True + assert D(i, q).is_above_fermi is False + assert D(q, i).is_above_fermi is False + assert D(q, v).is_above_fermi is False + assert D(a, q).is_above_fermi is True + + assert D(i, j).is_below_fermi is True + assert D(a, b).is_below_fermi is False + assert D(p, q).is_below_fermi is True + assert D(p, j).is_below_fermi is True + assert D(q, b).is_below_fermi is False + + assert D(i, j).is_only_above_fermi is False + assert D(a, b).is_only_above_fermi is True + assert D(p, q).is_only_above_fermi is False + assert D(i, q).is_only_above_fermi is False + assert D(q, i).is_only_above_fermi is False + assert D(a, q).is_only_above_fermi is True + + assert D(i, j).is_only_below_fermi is True + assert D(a, b).is_only_below_fermi is False + assert D(p, q).is_only_below_fermi is False + assert D(p, j).is_only_below_fermi is True + assert D(q, b).is_only_below_fermi is False + + assert not D(i, q).indices_contain_equal_information + assert not D(a, q).indices_contain_equal_information + assert D(p, q).indices_contain_equal_information + assert D(a, b).indices_contain_equal_information + assert D(i, j).indices_contain_equal_information + + assert D(q, b).preferred_index == b + assert D(q, b).killable_index == q + assert D(q, t).preferred_index == t + assert D(q, t).killable_index == q + assert D(q, i).preferred_index == i + assert D(q, i).killable_index == q + assert D(q, v).preferred_index == v + assert D(q, v).killable_index == q + assert D(q, p).preferred_index == p + assert D(q, p).killable_index == q + + EV = evaluate_deltas + assert EV(D(a, q)*F(q)) == F(a) + assert EV(D(i, q)*F(q)) == F(i) + assert EV(D(a, q)*F(a)) == D(a, q)*F(a) + assert EV(D(i, q)*F(i)) == D(i, q)*F(i) + assert EV(D(a, b)*F(a)) == F(b) + assert EV(D(a, b)*F(b)) == F(a) + assert EV(D(i, j)*F(i)) == F(j) + assert EV(D(i, j)*F(j)) == F(i) + assert EV(D(p, q)*F(q)) == F(p) + assert EV(D(p, q)*F(p)) == F(q) + assert EV(D(p, j)*D(p, i)*F(i)) == F(j) + assert EV(D(p, j)*D(p, i)*F(j)) == F(i) + assert EV(D(p, q)*D(p, i))*F(i) == D(q, i)*F(i) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_zeta_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_zeta_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..c2083b0b6e8cb38fde17fb1ede2a34be6338b1dc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/tests/test_zeta_functions.py @@ -0,0 +1,286 @@ +from sympy.concrete.summations import Sum +from sympy.core.function import expand_func +from sympy.core.numbers import (Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import (Abs, polar_lift) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.special.zeta_functions import (dirichlet_eta, lerchphi, polylog, riemann_xi, stieltjes, zeta) +from sympy.series.order import O +from sympy.core.function import ArgumentIndexError +from sympy.functions.combinatorial.numbers import bernoulli, factorial, genocchi, harmonic +from sympy.testing.pytest import raises +from sympy.core.random import (test_derivative_numerically as td, + random_complex_number as randcplx, verify_numerically) + +x = Symbol('x') +a = Symbol('a') +b = Symbol('b', negative=True) +z = Symbol('z') +s = Symbol('s') + + +def test_zeta_eval(): + + assert zeta(nan) is nan + assert zeta(x, nan) is nan + + assert zeta(0) == Rational(-1, 2) + assert zeta(0, x) == S.Half - x + assert zeta(0, b) == S.Half - b + + assert zeta(1) is zoo + assert zeta(1, 2) is zoo + assert zeta(1, -7) is zoo + assert zeta(1, x) is zoo + + assert zeta(2, 1) == pi**2/6 + assert zeta(3, 1) == zeta(3) + + assert zeta(2) == pi**2/6 + assert zeta(4) == pi**4/90 + assert zeta(6) == pi**6/945 + + assert zeta(4, 3) == pi**4/90 - Rational(17, 16) + assert zeta(7, 4) == zeta(7) - Rational(282251, 279936) + assert zeta(S.Half, 2).func == zeta + assert expand_func(zeta(S.Half, 2)) == zeta(S.Half) - 1 + assert zeta(x, 3).func == zeta + assert expand_func(zeta(x, 3)) == zeta(x) - 1 - 1/2**x + + assert zeta(2, 0) is nan + assert zeta(3, -1) is nan + assert zeta(4, -2) is nan + + assert zeta(oo) == 1 + + assert zeta(-1) == Rational(-1, 12) + assert zeta(-2) == 0 + assert zeta(-3) == Rational(1, 120) + assert zeta(-4) == 0 + assert zeta(-5) == Rational(-1, 252) + + assert zeta(-1, 3) == Rational(-37, 12) + assert zeta(-1, 7) == Rational(-253, 12) + assert zeta(-1, -4) == Rational(-121, 12) + assert zeta(-1, -9) == Rational(-541, 12) + + assert zeta(-4, 3) == -17 + assert zeta(-4, -8) == 8772 + + assert zeta(0, 1) == Rational(-1, 2) + assert zeta(0, -1) == Rational(3, 2) + + assert zeta(0, 2) == Rational(-3, 2) + assert zeta(0, -2) == Rational(5, 2) + + assert zeta( + 3).evalf(20).epsilon_eq(Float("1.2020569031595942854", 20), 1e-19) + + +def test_zeta_series(): + assert zeta(x, a).series(a, z, 2) == \ + zeta(x, z) - x*(a-z)*zeta(x+1, z) + O((a-z)**2, (a, z)) + + +def test_dirichlet_eta_eval(): + assert dirichlet_eta(0) == S.Half + assert dirichlet_eta(-1) == Rational(1, 4) + assert dirichlet_eta(1) == log(2) + assert dirichlet_eta(1, S.Half).simplify() == pi/2 + assert dirichlet_eta(1, 2) == 1 - log(2) + assert dirichlet_eta(2) == pi**2/12 + assert dirichlet_eta(4) == pi**4*Rational(7, 720) + assert str(dirichlet_eta(I).evalf(n=10)) == '0.5325931818 + 0.2293848577*I' + assert str(dirichlet_eta(I, I).evalf(n=10)) == '3.462349253 + 0.220285771*I' + + +def test_riemann_xi_eval(): + assert riemann_xi(2) == pi/6 + assert riemann_xi(0) == Rational(1, 2) + assert riemann_xi(1) == Rational(1, 2) + assert riemann_xi(3).rewrite(zeta) == 3*zeta(3)/(2*pi) + assert riemann_xi(4) == pi**2/15 + + +def test_rewriting(): + from sympy.functions.elementary.piecewise import Piecewise + assert isinstance(dirichlet_eta(x).rewrite(zeta), Piecewise) + assert isinstance(dirichlet_eta(x).rewrite(genocchi), Piecewise) + assert zeta(x).rewrite(dirichlet_eta) == dirichlet_eta(x)/(1 - 2**(1 - x)) + assert zeta(x).rewrite(dirichlet_eta, a=2) == zeta(x) + assert verify_numerically(dirichlet_eta(x), dirichlet_eta(x).rewrite(zeta), x) + assert verify_numerically(dirichlet_eta(x), dirichlet_eta(x).rewrite(genocchi), x) + assert verify_numerically(zeta(x), zeta(x).rewrite(dirichlet_eta), x) + + assert zeta(x, a).rewrite(lerchphi) == lerchphi(1, x, a) + assert polylog(s, z).rewrite(lerchphi) == lerchphi(z, s, 1)*z + + assert lerchphi(1, x, a).rewrite(zeta) == zeta(x, a) + assert z*lerchphi(z, s, 1).rewrite(polylog) == polylog(s, z) + + +def test_derivatives(): + from sympy.core.function import Derivative + assert zeta(x, a).diff(x) == Derivative(zeta(x, a), x) + assert zeta(x, a).diff(a) == -x*zeta(x + 1, a) + assert lerchphi( + z, s, a).diff(z) == (lerchphi(z, s - 1, a) - a*lerchphi(z, s, a))/z + assert lerchphi(z, s, a).diff(a) == -s*lerchphi(z, s + 1, a) + assert polylog(s, z).diff(z) == polylog(s - 1, z)/z + + b = randcplx() + c = randcplx() + assert td(zeta(b, x), x) + assert td(polylog(b, z), z) + assert td(lerchphi(c, b, x), x) + assert td(lerchphi(x, b, c), x) + raises(ArgumentIndexError, lambda: lerchphi(c, b, x).fdiff(2)) + raises(ArgumentIndexError, lambda: lerchphi(c, b, x).fdiff(4)) + raises(ArgumentIndexError, lambda: polylog(b, z).fdiff(1)) + raises(ArgumentIndexError, lambda: polylog(b, z).fdiff(3)) + + +def myexpand(func, target): + expanded = expand_func(func) + if target is not None: + return expanded == target + if expanded == func: # it didn't expand + return False + + # check to see that the expanded and original evaluate to the same value + subs = {} + for a in func.free_symbols: + subs[a] = randcplx() + return abs(func.subs(subs).n() + - expanded.replace(exp_polar, exp).subs(subs).n()) < 1e-10 + + +def test_polylog_expansion(): + assert polylog(s, 0) == 0 + assert polylog(s, 1) == zeta(s) + assert polylog(s, -1) == -dirichlet_eta(s) + assert polylog(s, exp_polar(I*pi*Rational(4, 3))) == polylog(s, exp(I*pi*Rational(4, 3))) + assert polylog(s, exp_polar(I*pi)/3) == polylog(s, exp(I*pi)/3) + + assert myexpand(polylog(1, z), -log(1 - z)) + assert myexpand(polylog(0, z), z/(1 - z)) + assert myexpand(polylog(-1, z), z/(1 - z)**2) + assert ((1-z)**3 * expand_func(polylog(-2, z))).simplify() == z*(1 + z) + assert myexpand(polylog(-5, z), None) + + +def test_polylog_series(): + assert polylog(1, z).series(z, n=5) == z + z**2/2 + z**3/3 + z**4/4 + O(z**5) + assert polylog(1, sqrt(z)).series(z, n=3) == z/2 + z**2/4 + sqrt(z)\ + + z**(S(3)/2)/3 + z**(S(5)/2)/5 + O(z**3) + + # https://github.com/sympy/sympy/issues/9497 + assert polylog(S(3)/2, -z).series(z, 0, 5) == -z + sqrt(2)*z**2/4\ + - sqrt(3)*z**3/9 + z**4/8 + O(z**5) + + +def test_issue_8404(): + i = Symbol('i', integer=True) + assert Abs(Sum(1/(3*i + 1)**2, (i, 0, S.Infinity)).doit().n(4) + - 1.122) < 0.001 + + +def test_polylog_values(): + assert polylog(2, 2) == pi**2/4 - I*pi*log(2) + assert polylog(2, S.Half) == pi**2/12 - log(2)**2/2 + for z in [S.Half, 2, (sqrt(5)-1)/2, -(sqrt(5)-1)/2, -(sqrt(5)+1)/2, (3-sqrt(5))/2]: + assert Abs(polylog(2, z).evalf() - polylog(2, z, evaluate=False).evalf()) < 1e-15 + z = Symbol("z") + for s in [-1, 0]: + for _ in range(10): + assert verify_numerically(polylog(s, z), polylog(s, z, evaluate=False), + z, a=-3, b=-2, c=S.Half, d=2) + assert verify_numerically(polylog(s, z), polylog(s, z, evaluate=False), + z, a=2, b=-2, c=5, d=2) + + from sympy.integrals.integrals import Integral + assert polylog(0, Integral(1, (x, 0, 1))) == -S.Half + + +def test_lerchphi_expansion(): + assert myexpand(lerchphi(1, s, a), zeta(s, a)) + assert myexpand(lerchphi(z, s, 1), polylog(s, z)/z) + + # direct summation + assert myexpand(lerchphi(z, -1, a), a/(1 - z) + z/(1 - z)**2) + assert myexpand(lerchphi(z, -3, a), None) + # polylog reduction + assert myexpand(lerchphi(z, s, S.Half), + 2**(s - 1)*(polylog(s, sqrt(z))/sqrt(z) + - polylog(s, polar_lift(-1)*sqrt(z))/sqrt(z))) + assert myexpand(lerchphi(z, s, 2), -1/z + polylog(s, z)/z**2) + assert myexpand(lerchphi(z, s, Rational(3, 2)), None) + assert myexpand(lerchphi(z, s, Rational(7, 3)), None) + assert myexpand(lerchphi(z, s, Rational(-1, 3)), None) + assert myexpand(lerchphi(z, s, Rational(-5, 2)), None) + + # hurwitz zeta reduction + assert myexpand(lerchphi(-1, s, a), + 2**(-s)*zeta(s, a/2) - 2**(-s)*zeta(s, (a + 1)/2)) + assert myexpand(lerchphi(I, s, a), None) + assert myexpand(lerchphi(-I, s, a), None) + assert myexpand(lerchphi(exp(I*pi*Rational(2, 5)), s, a), None) + + +def test_stieltjes(): + assert isinstance(stieltjes(x), stieltjes) + assert isinstance(stieltjes(x, a), stieltjes) + + # Zero'th constant EulerGamma + assert stieltjes(0) == S.EulerGamma + assert stieltjes(0, 1) == S.EulerGamma + + # Not defined + assert stieltjes(nan) is nan + assert stieltjes(0, nan) is nan + assert stieltjes(-1) is S.ComplexInfinity + assert stieltjes(1.5) is S.ComplexInfinity + assert stieltjes(z, 0) is S.ComplexInfinity + assert stieltjes(z, -1) is S.ComplexInfinity + + +def test_stieltjes_evalf(): + assert abs(stieltjes(0).evalf() - 0.577215664) < 1E-9 + assert abs(stieltjes(0, 0.5).evalf() - 1.963510026) < 1E-9 + assert abs(stieltjes(1, 2).evalf() + 0.072815845) < 1E-9 + + +def test_issue_10475(): + a = Symbol('a', extended_real=True) + b = Symbol('b', extended_positive=True) + s = Symbol('s', zero=False) + + assert zeta(2 + I).is_finite + assert zeta(1).is_finite is False + assert zeta(x).is_finite is None + assert zeta(x + I).is_finite is None + assert zeta(a).is_finite is None + assert zeta(b).is_finite is None + assert zeta(-b).is_finite is True + assert zeta(b**2 - 2*b + 1).is_finite is None + assert zeta(a + I).is_finite is True + assert zeta(b + 1).is_finite is True + assert zeta(s + 1).is_finite is True + + +def test_issue_14177(): + n = Symbol('n', nonnegative=True, integer=True) + + assert zeta(-n).rewrite(bernoulli) == bernoulli(n+1) / (-n-1) + assert zeta(-n, a).rewrite(bernoulli) == bernoulli(n+1, a) / (-n-1) + z2n = -(2*I*pi)**(2*n)*bernoulli(2*n) / (2*factorial(2*n)) + assert zeta(2*n).rewrite(bernoulli) == z2n + assert expand_func(zeta(s, n+1)) == zeta(s) - harmonic(n, s) + assert expand_func(zeta(-b, -n)) is nan + assert expand_func(zeta(-b, n)) == zeta(-b, n) + + n = Symbol('n') + + assert zeta(2*n) == zeta(2*n) # As sign of z (= 2*n) is not determined diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/zeta_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/zeta_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..8f410f0f1086de91490c714cd3becf11df9ab189 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/functions/special/zeta_functions.py @@ -0,0 +1,786 @@ +""" Riemann zeta and related function. """ + +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.function import ArgumentIndexError, expand_mul, DefinedFunction +from sympy.core.logic import fuzzy_not +from sympy.core.numbers import pi, I, Integer +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.numbers import bernoulli, factorial, genocchi, harmonic +from sympy.functions.elementary.complexes import re, unpolarify, Abs, polar_lift +from sympy.functions.elementary.exponential import log, exp_polar, exp +from sympy.functions.elementary.integers import ceiling, floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.polys.polytools import Poly + +############################################################################### +###################### LERCH TRANSCENDENT ##################################### +############################################################################### + + +class lerchphi(DefinedFunction): + r""" + Lerch transcendent (Lerch phi function). + + Explanation + =========== + + For $\operatorname{Re}(a) > 0$, $|z| < 1$ and $s \in \mathbb{C}$, the + Lerch transcendent is defined as + + .. math :: \Phi(z, s, a) = \sum_{n=0}^\infty \frac{z^n}{(n + a)^s}, + + where the standard branch of the argument is used for $n + a$, + and by analytic continuation for other values of the parameters. + + A commonly used related function is the Lerch zeta function, defined by + + .. math:: L(q, s, a) = \Phi(e^{2\pi i q}, s, a). + + **Analytic Continuation and Branching Behavior** + + It can be shown that + + .. math:: \Phi(z, s, a) = z\Phi(z, s, a+1) + a^{-s}. + + This provides the analytic continuation to $\operatorname{Re}(a) \le 0$. + + Assume now $\operatorname{Re}(a) > 0$. The integral representation + + .. math:: \Phi_0(z, s, a) = \int_0^\infty \frac{t^{s-1} e^{-at}}{1 - ze^{-t}} + \frac{\mathrm{d}t}{\Gamma(s)} + + provides an analytic continuation to $\mathbb{C} - [1, \infty)$. + Finally, for $x \in (1, \infty)$ we find + + .. math:: \lim_{\epsilon \to 0^+} \Phi_0(x + i\epsilon, s, a) + -\lim_{\epsilon \to 0^+} \Phi_0(x - i\epsilon, s, a) + = \frac{2\pi i \log^{s-1}{x}}{x^a \Gamma(s)}, + + using the standard branch for both $\log{x}$ and + $\log{\log{x}}$ (a branch of $\log{\log{x}}$ is needed to + evaluate $\log{x}^{s-1}$). + This concludes the analytic continuation. The Lerch transcendent is thus + branched at $z \in \{0, 1, \infty\}$ and + $a \in \mathbb{Z}_{\le 0}$. For fixed $z, a$ outside these + branch points, it is an entire function of $s$. + + Examples + ======== + + The Lerch transcendent is a fairly general function, for this reason it does + not automatically evaluate to simpler functions. Use ``expand_func()`` to + achieve this. + + If $z=1$, the Lerch transcendent reduces to the Hurwitz zeta function: + + >>> from sympy import lerchphi, expand_func + >>> from sympy.abc import z, s, a + >>> expand_func(lerchphi(1, s, a)) + zeta(s, a) + + More generally, if $z$ is a root of unity, the Lerch transcendent + reduces to a sum of Hurwitz zeta functions: + + >>> expand_func(lerchphi(-1, s, a)) + zeta(s, a/2)/2**s - zeta(s, a/2 + 1/2)/2**s + + If $a=1$, the Lerch transcendent reduces to the polylogarithm: + + >>> expand_func(lerchphi(z, s, 1)) + polylog(s, z)/z + + More generally, if $a$ is rational, the Lerch transcendent reduces + to a sum of polylogarithms: + + >>> from sympy import S + >>> expand_func(lerchphi(z, s, S(1)/2)) + 2**(s - 1)*(polylog(s, sqrt(z))/sqrt(z) - + polylog(s, sqrt(z)*exp_polar(I*pi))/sqrt(z)) + >>> expand_func(lerchphi(z, s, S(3)/2)) + -2**s/z + 2**(s - 1)*(polylog(s, sqrt(z))/sqrt(z) - + polylog(s, sqrt(z)*exp_polar(I*pi))/sqrt(z))/z + + The derivatives with respect to $z$ and $a$ can be computed in + closed form: + + >>> lerchphi(z, s, a).diff(z) + (-a*lerchphi(z, s, a) + lerchphi(z, s - 1, a))/z + >>> lerchphi(z, s, a).diff(a) + -s*lerchphi(z, s + 1, a) + + See Also + ======== + + polylog, zeta + + References + ========== + + .. [1] Bateman, H.; Erdelyi, A. (1953), Higher Transcendental Functions, + Vol. I, New York: McGraw-Hill. Section 1.11. + .. [2] https://dlmf.nist.gov/25.14 + .. [3] https://en.wikipedia.org/wiki/Lerch_transcendent + + """ + + def _eval_expand_func(self, **hints): + z, s, a = self.args + if z == 1: + return zeta(s, a) + if s.is_Integer and s <= 0: + t = Dummy('t') + p = Poly((t + a)**(-s), t) + start = 1/(1 - t) + res = S.Zero + for c in reversed(p.all_coeffs()): + res += c*start + start = t*start.diff(t) + return res.subs(t, z) + + if a.is_Rational: + # See section 18 of + # Kelly B. Roach. Hypergeometric Function Representations. + # In: Proceedings of the 1997 International Symposium on Symbolic and + # Algebraic Computation, pages 205-211, New York, 1997. ACM. + # TODO should something be polarified here? + add = S.Zero + mul = S.One + # First reduce a to the interaval (0, 1] + if a > 1: + n = floor(a) + if n == a: + n -= 1 + a -= n + mul = z**(-n) + add = Add(*[-z**(k - n)/(a + k)**s for k in range(n)]) + elif a <= 0: + n = floor(-a) + 1 + a += n + mul = z**n + add = Add(*[z**(n - 1 - k)/(a - k - 1)**s for k in range(n)]) + + m, n = S([a.p, a.q]) + zet = exp_polar(2*pi*I/n) + root = z**(1/n) + up_zet = unpolarify(zet) + addargs = [] + for k in range(n): + p = polylog(s, zet**k*root) + if isinstance(p, polylog): + p = p._eval_expand_func(**hints) + addargs.append(p/(up_zet**k*root)**m) + return add + mul*n**(s - 1)*Add(*addargs) + + # TODO use minpoly instead of ad-hoc methods when issue 5888 is fixed + if isinstance(z, exp) and (z.args[0]/(pi*I)).is_Rational or z in [-1, I, -I]: + # TODO reference? + if z == -1: + p, q = S([1, 2]) + elif z == I: + p, q = S([1, 4]) + elif z == -I: + p, q = S([-1, 4]) + else: + arg = z.args[0]/(2*pi*I) + p, q = S([arg.p, arg.q]) + return Add(*[exp(2*pi*I*k*p/q)/q**s*zeta(s, (k + a)/q) + for k in range(q)]) + + return lerchphi(z, s, a) + + def fdiff(self, argindex=1): + z, s, a = self.args + if argindex == 3: + return -s*lerchphi(z, s + 1, a) + elif argindex == 1: + return (lerchphi(z, s - 1, a) - a*lerchphi(z, s, a))/z + else: + raise ArgumentIndexError + + def _eval_rewrite_helper(self, target): + res = self._eval_expand_func() + if res.has(target): + return res + else: + return self + + def _eval_rewrite_as_zeta(self, z, s, a, **kwargs): + return self._eval_rewrite_helper(zeta) + + def _eval_rewrite_as_polylog(self, z, s, a, **kwargs): + return self._eval_rewrite_helper(polylog) + +############################################################################### +###################### POLYLOGARITHM ########################################## +############################################################################### + + +class polylog(DefinedFunction): + r""" + Polylogarithm function. + + Explanation + =========== + + For $|z| < 1$ and $s \in \mathbb{C}$, the polylogarithm is + defined by + + .. math:: \operatorname{Li}_s(z) = \sum_{n=1}^\infty \frac{z^n}{n^s}, + + where the standard branch of the argument is used for $n$. It admits + an analytic continuation which is branched at $z=1$ (notably not on the + sheet of initial definition), $z=0$ and $z=\infty$. + + The name polylogarithm comes from the fact that for $s=1$, the + polylogarithm is related to the ordinary logarithm (see examples), and that + + .. math:: \operatorname{Li}_{s+1}(z) = + \int_0^z \frac{\operatorname{Li}_s(t)}{t} \mathrm{d}t. + + The polylogarithm is a special case of the Lerch transcendent: + + .. math:: \operatorname{Li}_{s}(z) = z \Phi(z, s, 1). + + Examples + ======== + + For $z \in \{0, 1, -1\}$, the polylogarithm is automatically expressed + using other functions: + + >>> from sympy import polylog + >>> from sympy.abc import s + >>> polylog(s, 0) + 0 + >>> polylog(s, 1) + zeta(s) + >>> polylog(s, -1) + -dirichlet_eta(s) + + If $s$ is a negative integer, $0$ or $1$, the polylogarithm can be + expressed using elementary functions. This can be done using + ``expand_func()``: + + >>> from sympy import expand_func + >>> from sympy.abc import z + >>> expand_func(polylog(1, z)) + -log(1 - z) + >>> expand_func(polylog(0, z)) + z/(1 - z) + + The derivative with respect to $z$ can be computed in closed form: + + >>> polylog(s, z).diff(z) + polylog(s - 1, z)/z + + The polylogarithm can be expressed in terms of the lerch transcendent: + + >>> from sympy import lerchphi + >>> polylog(s, z).rewrite(lerchphi) + z*lerchphi(z, s, 1) + + See Also + ======== + + zeta, lerchphi + + """ + + @classmethod + def eval(cls, s, z): + if z.is_number: + if z is S.One: + return zeta(s) + elif z is S.NegativeOne: + return -dirichlet_eta(s) + elif z is S.Zero: + return S.Zero + elif s == 2: + dilogtable = _dilogtable() + if z in dilogtable: + return dilogtable[z] + + if z.is_zero: + return S.Zero + + # Make an effort to determine if z is 1 to avoid replacing into + # expression with singularity + zone = z.equals(S.One) + + if zone: + return zeta(s) + elif zone is False: + # For s = 0 or -1 use explicit formulas to evaluate, but + # automatically expanding polylog(1, z) to -log(1-z) seems + # undesirable for summation methods based on hypergeometric + # functions + if s is S.Zero: + return z/(1 - z) + elif s is S.NegativeOne: + return z/(1 - z)**2 + if s.is_zero: + return z/(1 - z) + + # polylog is branched, but not over the unit disk + if z.has(exp_polar, polar_lift) and (zone or (Abs(z) <= S.One) == True): + return cls(s, unpolarify(z)) + + def fdiff(self, argindex=1): + s, z = self.args + if argindex == 2: + return polylog(s - 1, z)/z + raise ArgumentIndexError + + def _eval_rewrite_as_lerchphi(self, s, z, **kwargs): + return z*lerchphi(z, s, 1) + + def _eval_expand_func(self, **hints): + s, z = self.args + if s == 1: + return -log(1 - z) + if s.is_Integer and s <= 0: + u = Dummy('u') + start = u/(1 - u) + for _ in range(-s): + start = u*start.diff(u) + return expand_mul(start).subs(u, z) + return polylog(s, z) + + def _eval_is_zero(self): + z = self.args[1] + if z.is_zero: + return True + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.series.order import Order + nu, z = self.args + + z0 = z.subs(x, 0) + if z0 is S.NaN: + z0 = z.limit(x, 0, dir='-' if re(cdir).is_negative else '+') + + if z0.is_zero: + # In case of powers less than 1, number of terms need to be computed + # separately to avoid repeated callings of _eval_nseries with wrong n + try: + _, exp = z.leadterm(x) + except (ValueError, NotImplementedError): + return self + + if exp.is_positive: + newn = ceiling(n/exp) + o = Order(x**n, x) + r = z._eval_nseries(x, n, logx, cdir).removeO() + if r is S.Zero: + return o + + term = r + s = [term] + for k in range(2, newn): + term *= r + s.append(term/k**nu) + return Add(*s) + o + + return super(polylog, self)._eval_nseries(x, n, logx, cdir) + +############################################################################### +###################### HURWITZ GENERALIZED ZETA FUNCTION ###################### +############################################################################### + + +class zeta(DefinedFunction): + r""" + Hurwitz zeta function (or Riemann zeta function). + + Explanation + =========== + + For $\operatorname{Re}(a) > 0$ and $\operatorname{Re}(s) > 1$, this + function is defined as + + .. math:: \zeta(s, a) = \sum_{n=0}^\infty \frac{1}{(n + a)^s}, + + where the standard choice of argument for $n + a$ is used. For fixed + $a$ not a nonpositive integer the Hurwitz zeta function admits a + meromorphic continuation to all of $\mathbb{C}$; it is an unbranched + function with a simple pole at $s = 1$. + + The Hurwitz zeta function is a special case of the Lerch transcendent: + + .. math:: \zeta(s, a) = \Phi(1, s, a). + + This formula defines an analytic continuation for all possible values of + $s$ and $a$ (also $\operatorname{Re}(a) < 0$), see the documentation of + :class:`lerchphi` for a description of the branching behavior. + + If no value is passed for $a$ a default value of $a = 1$ is assumed, + yielding the Riemann zeta function. + + Examples + ======== + + For $a = 1$ the Hurwitz zeta function reduces to the famous Riemann + zeta function: + + .. math:: \zeta(s, 1) = \zeta(s) = \sum_{n=1}^\infty \frac{1}{n^s}. + + >>> from sympy import zeta + >>> from sympy.abc import s + >>> zeta(s, 1) + zeta(s) + >>> zeta(s) + zeta(s) + + The Riemann zeta function can also be expressed using the Dirichlet eta + function: + + >>> from sympy import dirichlet_eta + >>> zeta(s).rewrite(dirichlet_eta) + dirichlet_eta(s)/(1 - 2**(1 - s)) + + The Riemann zeta function at nonnegative even and negative integer + values is related to the Bernoulli numbers and polynomials: + + >>> zeta(2) + pi**2/6 + >>> zeta(4) + pi**4/90 + >>> zeta(0) + -1/2 + >>> zeta(-1) + -1/12 + >>> zeta(-4) + 0 + + The specific formulae are: + + .. math:: \zeta(2n) = -\frac{(2\pi i)^{2n} B_{2n}}{2(2n)!} + .. math:: \zeta(-n,a) = -\frac{B_{n+1}(a)}{n+1} + + No closed-form expressions are known at positive odd integers, but + numerical evaluation is possible: + + >>> zeta(3).n() + 1.20205690315959 + + The derivative of $\zeta(s, a)$ with respect to $a$ can be computed: + + >>> from sympy.abc import a + >>> zeta(s, a).diff(a) + -s*zeta(s + 1, a) + + However the derivative with respect to $s$ has no useful closed form + expression: + + >>> zeta(s, a).diff(s) + Derivative(zeta(s, a), s) + + The Hurwitz zeta function can be expressed in terms of the Lerch + transcendent, :class:`~.lerchphi`: + + >>> from sympy import lerchphi + >>> zeta(s, a).rewrite(lerchphi) + lerchphi(1, s, a) + + See Also + ======== + + dirichlet_eta, lerchphi, polylog + + References + ========== + + .. [1] https://dlmf.nist.gov/25.11 + .. [2] https://en.wikipedia.org/wiki/Hurwitz_zeta_function + + """ + + @classmethod + def eval(cls, s, a=None): + if a is S.One: + return cls(s) + elif s is S.NaN or a is S.NaN: + return S.NaN + elif s is S.One: + return S.ComplexInfinity + elif s is S.Infinity: + return S.One + elif a is S.Infinity: + return S.Zero + + sint = s.is_Integer + if a is None: + a = S.One + if sint and s.is_nonpositive: + return bernoulli(1-s, a) / (s-1) + elif a is S.One: + if sint and s.is_even: + return -(2*pi*I)**s * bernoulli(s) / (2*factorial(s)) + elif sint and a.is_Integer and a.is_positive: + return cls(s) - harmonic(a-1, s) + elif a.is_Integer and a.is_nonpositive and \ + (s.is_integer is False or s.is_nonpositive is False): + return S.NaN + + def _eval_rewrite_as_bernoulli(self, s, a=1, **kwargs): + if a == 1 and s.is_integer and s.is_nonnegative and s.is_even: + return -(2*pi*I)**s * bernoulli(s) / (2*factorial(s)) + return bernoulli(1-s, a) / (s-1) + + def _eval_rewrite_as_dirichlet_eta(self, s, a=1, **kwargs): + if a != 1: + return self + s = self.args[0] + return dirichlet_eta(s)/(1 - 2**(1 - s)) + + def _eval_rewrite_as_lerchphi(self, s, a=1, **kwargs): + return lerchphi(1, s, a) + + def _eval_is_finite(self): + return fuzzy_not((self.args[0] - 1).is_zero) + + def _eval_expand_func(self, **hints): + s = self.args[0] + a = self.args[1] if len(self.args) > 1 else S.One + if a.is_integer: + if a.is_positive: + return zeta(s) - harmonic(a-1, s) + if a.is_nonpositive and (s.is_integer is False or + s.is_nonpositive is False): + return S.NaN + return self + + def fdiff(self, argindex=1): + if len(self.args) == 2: + s, a = self.args + else: + s, a = self.args + (1,) + if argindex == 2: + return -s*zeta(s + 1, a) + else: + raise ArgumentIndexError + + def _eval_as_leading_term(self, x, logx, cdir): + if len(self.args) == 2: + s, a = self.args + else: + s, a = self.args + (S.One,) + + try: + c, e = a.leadterm(x) + except NotImplementedError: + return self + + if e.is_negative and not s.is_positive: + raise NotImplementedError + + return super(zeta, self)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + +class dirichlet_eta(DefinedFunction): + r""" + Dirichlet eta function. + + Explanation + =========== + + For $\operatorname{Re}(s) > 0$ and $0 < x \le 1$, this function is defined as + + .. math:: \eta(s, a) = \sum_{n=0}^\infty \frac{(-1)^n}{(n+a)^s}. + + It admits a unique analytic continuation to all of $\mathbb{C}$ for any + fixed $a$ not a nonpositive integer. It is an entire, unbranched function. + + It can be expressed using the Hurwitz zeta function as + + .. math:: \eta(s, a) = \zeta(s,a) - 2^{1-s} \zeta\left(s, \frac{a+1}{2}\right) + + and using the generalized Genocchi function as + + .. math:: \eta(s, a) = \frac{G(1-s, a)}{2(s-1)}. + + In both cases the limiting value of $\log2 - \psi(a) + \psi\left(\frac{a+1}{2}\right)$ + is used when $s = 1$. + + Examples + ======== + + >>> from sympy import dirichlet_eta, zeta + >>> from sympy.abc import s + >>> dirichlet_eta(s).rewrite(zeta) + Piecewise((log(2), Eq(s, 1)), ((1 - 2**(1 - s))*zeta(s), True)) + + See Also + ======== + + zeta + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Dirichlet_eta_function + .. [2] Peter Luschny, "An introduction to the Bernoulli function", + https://arxiv.org/abs/2009.06743 + + """ + + @classmethod + def eval(cls, s, a=None): + if a is S.One: + return cls(s) + if a is None: + if s == 1: + return log(2) + z = zeta(s) + if not z.has(zeta): + return (1 - 2**(1-s)) * z + return + elif s == 1: + from sympy.functions.special.gamma_functions import digamma + return log(2) - digamma(a) + digamma((a+1)/2) + z1 = zeta(s, a) + z2 = zeta(s, (a+1)/2) + if not z1.has(zeta) and not z2.has(zeta): + return z1 - 2**(1-s) * z2 + + def _eval_rewrite_as_zeta(self, s, a=1, **kwargs): + from sympy.functions.special.gamma_functions import digamma + if a == 1: + return Piecewise((log(2), Eq(s, 1)), ((1 - 2**(1-s)) * zeta(s), True)) + return Piecewise((log(2) - digamma(a) + digamma((a+1)/2), Eq(s, 1)), + (zeta(s, a) - 2**(1-s) * zeta(s, (a+1)/2), True)) + + def _eval_rewrite_as_genocchi(self, s, a=S.One, **kwargs): + from sympy.functions.special.gamma_functions import digamma + return Piecewise((log(2) - digamma(a) + digamma((a+1)/2), Eq(s, 1)), + (genocchi(1-s, a) / (2 * (s-1)), True)) + + def _eval_evalf(self, prec): + if all(i.is_number for i in self.args): + return self.rewrite(zeta)._eval_evalf(prec) + + +class riemann_xi(DefinedFunction): + r""" + Riemann Xi function. + + Examples + ======== + + The Riemann Xi function is closely related to the Riemann zeta function. + The zeros of Riemann Xi function are precisely the non-trivial zeros + of the zeta function. + + >>> from sympy import riemann_xi, zeta + >>> from sympy.abc import s + >>> riemann_xi(s).rewrite(zeta) + s*(s - 1)*gamma(s/2)*zeta(s)/(2*pi**(s/2)) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Riemann_Xi_function + + """ + + + @classmethod + def eval(cls, s): + from sympy.functions.special.gamma_functions import gamma + z = zeta(s) + if s in (S.Zero, S.One): + return S.Half + + if not isinstance(z, zeta): + return s*(s - 1)*gamma(s/2)*z/(2*pi**(s/2)) + + def _eval_rewrite_as_zeta(self, s, **kwargs): + from sympy.functions.special.gamma_functions import gamma + return s*(s - 1)*gamma(s/2)*zeta(s)/(2*pi**(s/2)) + + +class stieltjes(DefinedFunction): + r""" + Represents Stieltjes constants, $\gamma_{k}$ that occur in + Laurent Series expansion of the Riemann zeta function. + + Examples + ======== + + >>> from sympy import stieltjes + >>> from sympy.abc import n, m + >>> stieltjes(n) + stieltjes(n) + + The zero'th stieltjes constant: + + >>> stieltjes(0) + EulerGamma + >>> stieltjes(0, 1) + EulerGamma + + For generalized stieltjes constants: + + >>> stieltjes(n, m) + stieltjes(n, m) + + Constants are only defined for integers >= 0: + + >>> stieltjes(-1) + zoo + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Stieltjes_constants + + """ + + @classmethod + def eval(cls, n, a=None): + if a is not None: + a = sympify(a) + if a is S.NaN: + return S.NaN + if a.is_Integer and a.is_nonpositive: + return S.ComplexInfinity + + if n.is_Number: + if n is S.NaN: + return S.NaN + elif n < 0: + return S.ComplexInfinity + elif not n.is_Integer: + return S.ComplexInfinity + elif n is S.Zero and a in [None, 1]: + return S.EulerGamma + + if n.is_extended_negative: + return S.ComplexInfinity + + if n.is_zero and a in [None, 1]: + return S.EulerGamma + + if n.is_integer == False: + return S.ComplexInfinity + + +@cacheit +def _dilogtable(): + return { + S.Half: pi**2/12 - log(2)**2/2, + Integer(2) : pi**2/4 - I*pi*log(2), + -(sqrt(5) - 1)/2 : -pi**2/15 + log((sqrt(5)-1)/2)**2/2, + -(sqrt(5) + 1)/2 : -pi**2/10 - log((sqrt(5)+1)/2)**2, + (3 - sqrt(5))/2 : pi**2/15 - log((sqrt(5)-1)/2)**2, + (sqrt(5) - 1)/2 : pi**2/10 - log((sqrt(5)-1)/2)**2, + I : I*S.Catalan - pi**2/48, + -I : -I*S.Catalan - pi**2/48, + 1 - I : pi**2/16 - I*S.Catalan - pi*I/4*log(2), + 1 + I : pi**2/16 + I*S.Catalan + pi*I/4*log(2), + (1 - I)/2 : -log(2)**2/8 + pi*I*log(2)/8 + 5*pi**2/96 - I*S.Catalan + } diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..bb85d4ff5d53eb44a039a95cfc2fff687322cc76 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/__init__.py @@ -0,0 +1,45 @@ +""" +A geometry module for the SymPy library. This module contains all of the +entities and functions needed to construct basic geometrical data and to +perform simple informational queries. + +Usage: +====== + +Examples +======== + +""" +from sympy.geometry.point import Point, Point2D, Point3D +from sympy.geometry.line import Line, Ray, Segment, Line2D, Segment2D, Ray2D, \ + Line3D, Segment3D, Ray3D +from sympy.geometry.plane import Plane +from sympy.geometry.ellipse import Ellipse, Circle +from sympy.geometry.polygon import Polygon, RegularPolygon, Triangle, rad, deg +from sympy.geometry.util import are_similar, centroid, convex_hull, idiff, \ + intersection, closest_points, farthest_points +from sympy.geometry.exceptions import GeometryError +from sympy.geometry.curve import Curve +from sympy.geometry.parabola import Parabola + +__all__ = [ + 'Point', 'Point2D', 'Point3D', + + 'Line', 'Ray', 'Segment', 'Line2D', 'Segment2D', 'Ray2D', 'Line3D', + 'Segment3D', 'Ray3D', + + 'Plane', + + 'Ellipse', 'Circle', + + 'Polygon', 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/dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/curve.py @@ -0,0 +1,424 @@ +"""Curves in 2-dimensional Euclidean space. + +Contains +======== +Curve + +""" + +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.core import diff +from sympy.core.containers import Tuple +from sympy.core.symbol import _symbol +from sympy.geometry.entity import GeometryEntity, GeometrySet +from sympy.geometry.point import Point +from sympy.integrals import integrate +from sympy.matrices import Matrix, rot_axis3 +from sympy.utilities.iterables import is_sequence + +from mpmath.libmp.libmpf import prec_to_dps + + +class Curve(GeometrySet): + """A curve in space. + + A curve is defined by parametric functions for the coordinates, a + parameter and the lower and upper bounds for the parameter value. + + Parameters + ========== + + function : list of functions + limits : 3-tuple + Function parameter and lower and upper bounds. + + Attributes + ========== + + functions + parameter + limits + + Raises + ====== + + ValueError + When `functions` are specified incorrectly. + When `limits` are specified incorrectly. + + Examples + ======== + + >>> from sympy import Curve, sin, cos, interpolate + >>> from sympy.abc import t, a + >>> C = Curve((sin(t), cos(t)), (t, 0, 2)) + >>> C.functions + (sin(t), cos(t)) + >>> C.limits + (t, 0, 2) + >>> C.parameter + t + >>> C = Curve((t, interpolate([1, 4, 9, 16], t)), (t, 0, 1)); C + Curve((t, t**2), (t, 0, 1)) + >>> C.subs(t, 4) + Point2D(4, 16) + >>> C.arbitrary_point(a) + Point2D(a, a**2) + + See Also + ======== + + sympy.core.function.Function + sympy.polys.polyfuncs.interpolate + + """ + + def __new__(cls, function, limits): + if not is_sequence(function) or len(function) != 2: + raise ValueError("Function argument should be (x(t), y(t)) " + "but got %s" % str(function)) + if not is_sequence(limits) or len(limits) != 3: + raise ValueError("Limit argument should be (t, tmin, tmax) " + "but got %s" % str(limits)) + + return GeometryEntity.__new__(cls, Tuple(*function), Tuple(*limits)) + + def __call__(self, f): + return self.subs(self.parameter, f) + + def _eval_subs(self, old, new): + if old == self.parameter: + return Point(*[f.subs(old, new) for f in self.functions]) + + def _eval_evalf(self, prec=15, **options): + f, (t, a, b) = self.args + dps = prec_to_dps(prec) + f = tuple([i.evalf(n=dps, **options) for i in f]) + a, b = [i.evalf(n=dps, **options) for i in (a, b)] + return self.func(f, (t, a, b)) + + def arbitrary_point(self, parameter='t'): + """A parameterized point on the curve. + + Parameters + ========== + + parameter : str or Symbol, optional + Default value is 't'. + The Curve's parameter is selected with None or self.parameter + otherwise the provided symbol is used. + + Returns + ======= + + Point : + Returns a point in parametric form. + + Raises + ====== + + ValueError + When `parameter` already appears in the functions. + + Examples + ======== + + >>> from sympy import Curve, Symbol + >>> from sympy.abc import s + >>> C = Curve([2*s, s**2], (s, 0, 2)) + >>> C.arbitrary_point() + Point2D(2*t, t**2) + >>> C.arbitrary_point(C.parameter) + Point2D(2*s, s**2) + >>> C.arbitrary_point(None) + Point2D(2*s, s**2) + >>> C.arbitrary_point(Symbol('a')) + Point2D(2*a, a**2) + + See Also + ======== + + sympy.geometry.point.Point + + """ + if parameter is None: + return Point(*self.functions) + + tnew = _symbol(parameter, self.parameter, real=True) + t = self.parameter + if (tnew.name != t.name and + tnew.name in (f.name for f in self.free_symbols)): + raise ValueError('Symbol %s already appears in object ' + 'and cannot be used as a parameter.' % tnew.name) + return Point(*[w.subs(t, tnew) for w in self.functions]) + + @property + def free_symbols(self): + """Return a set of symbols other than the bound symbols used to + parametrically define the Curve. + + Returns + ======= + + set : + Set of all non-parameterized symbols. + + Examples + ======== + + >>> from sympy.abc import t, a + >>> from sympy import Curve + >>> Curve((t, t**2), (t, 0, 2)).free_symbols + set() + >>> Curve((t, t**2), (t, a, 2)).free_symbols + {a} + + """ + free = set() + for a in self.functions + self.limits[1:]: + free |= a.free_symbols + free = free.difference({self.parameter}) + return free + + @property + def ambient_dimension(self): + """The dimension of the curve. + + Returns + ======= + + int : + the dimension of curve. + + Examples + ======== + + >>> from sympy.abc import t + >>> from sympy import Curve + >>> C = Curve((t, t**2), (t, 0, 2)) + >>> C.ambient_dimension + 2 + + """ + + return len(self.args[0]) + + @property + def functions(self): + """The functions specifying the curve. + + Returns + ======= + + functions : + list of parameterized coordinate functions. + + Examples + ======== + + >>> from sympy.abc import t + >>> from sympy import Curve + >>> C = Curve((t, t**2), (t, 0, 2)) + >>> C.functions + (t, t**2) + + See Also + ======== + + parameter + + """ + return self.args[0] + + @property + def limits(self): + """The limits for the curve. + + Returns + ======= + + limits : tuple + Contains parameter and lower and upper limits. + + Examples + ======== + + >>> from sympy.abc import t + >>> from sympy import Curve + >>> C = Curve([t, t**3], (t, -2, 2)) + >>> C.limits + (t, -2, 2) + + See Also + ======== + + plot_interval + + """ + return self.args[1] + + @property + def parameter(self): + """The curve function variable. + + Returns + ======= + + Symbol : + returns a bound symbol. + + Examples + ======== + + >>> from sympy.abc import t + >>> from sympy import Curve + >>> C = Curve([t, t**2], (t, 0, 2)) + >>> C.parameter + t + + See Also + ======== + + functions + + """ + return self.args[1][0] + + @property + def length(self): + """The curve length. + + Examples + ======== + + >>> from sympy import Curve + >>> from sympy.abc import t + >>> Curve((t, t), (t, 0, 1)).length + sqrt(2) + + """ + integrand = sqrt(sum(diff(func, self.limits[0])**2 for func in self.functions)) + return integrate(integrand, self.limits) + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of the curve. + + Parameters + ========== + + parameter : str or Symbol, optional + Default value is 't'; + otherwise the provided symbol is used. + + Returns + ======= + + List : + the plot interval as below: + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Curve, sin + >>> from sympy.abc import x, s + >>> Curve((x, sin(x)), (x, 1, 2)).plot_interval() + [t, 1, 2] + >>> Curve((x, sin(x)), (x, 1, 2)).plot_interval(s) + [s, 1, 2] + + See Also + ======== + + limits : Returns limits of the parameter interval + + """ + t = _symbol(parameter, self.parameter, real=True) + return [t] + list(self.limits[1:]) + + def rotate(self, angle=0, pt=None): + """This function is used to rotate a curve along given point ``pt`` at given angle(in radian). + + Parameters + ========== + + angle : + the angle at which the curve will be rotated(in radian) in counterclockwise direction. + default value of angle is 0. + + pt : Point + the point along which the curve will be rotated. + If no point given, the curve will be rotated around origin. + + Returns + ======= + + Curve : + returns a curve rotated at given angle along given point. + + Examples + ======== + + >>> from sympy import Curve, pi + >>> from sympy.abc import x + >>> Curve((x, x), (x, 0, 1)).rotate(pi/2) + Curve((-x, x), (x, 0, 1)) + + """ + if pt: + pt = -Point(pt, dim=2) + else: + pt = Point(0,0) + rv = self.translate(*pt.args) + f = list(rv.functions) + f.append(0) + f = Matrix(1, 3, f) + f *= rot_axis3(angle) + rv = self.func(f[0, :2].tolist()[0], self.limits) + pt = -pt + return rv.translate(*pt.args) + + def scale(self, x=1, y=1, pt=None): + """Override GeometryEntity.scale since Curve is not made up of Points. + + Returns + ======= + + Curve : + returns scaled curve. + + Examples + ======== + + >>> from sympy import Curve + >>> from sympy.abc import x + >>> Curve((x, x), (x, 0, 1)).scale(2) + Curve((2*x, x), (x, 0, 1)) + + """ + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + fx, fy = self.functions + return self.func((fx*x, fy*y), self.limits) + + def translate(self, x=0, y=0): + """Translate the Curve by (x, y). + + Returns + ======= + + Curve : + returns a translated curve. + + Examples + ======== + + >>> from sympy import Curve + >>> from sympy.abc import x + >>> Curve((x, x), (x, 0, 1)).translate(1, 2) + Curve((x + 1, x + 2), (x, 0, 1)) + + """ + fx, fy = self.functions + return self.func((fx + x, fy + y), self.limits) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/ellipse.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/ellipse.py new file mode 100644 index 0000000000000000000000000000000000000000..199db25fde9b019893a275d69959154990e8a4a7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/ellipse.py @@ -0,0 +1,1768 @@ +"""Elliptical geometrical entities. + +Contains +* Ellipse +* Circle + +""" + +from sympy.core.expr import Expr +from sympy.core.relational import Eq +from sympy.core import S, pi, sympify +from sympy.core.evalf import N +from sympy.core.parameters import global_parameters +from sympy.core.logic import fuzzy_bool +from sympy.core.numbers import Rational, oo +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy, uniquely_named_symbol, _symbol +from sympy.simplify.simplify import simplify +from sympy.simplify.trigsimp import trigsimp +from sympy.functions.elementary.miscellaneous import sqrt, Max +from sympy.functions.elementary.trigonometric import cos, sin +from sympy.functions.special.elliptic_integrals import elliptic_e +from .entity import GeometryEntity, GeometrySet +from .exceptions import GeometryError +from .line import Line, Segment, Ray2D, Segment2D, Line2D, LinearEntity3D +from .point import Point, Point2D, Point3D +from .util import idiff, find +from sympy.polys import DomainError, Poly, PolynomialError +from sympy.polys.polyutils import _not_a_coeff, _nsort +from sympy.solvers import solve +from sympy.solvers.solveset import linear_coeffs +from sympy.utilities.misc import filldedent, func_name + +from mpmath.libmp.libmpf import prec_to_dps + +import random + +x, y = [Dummy('ellipse_dummy', real=True) for i in range(2)] + + +class Ellipse(GeometrySet): + """An elliptical GeometryEntity. + + Parameters + ========== + + center : Point, optional + Default value is Point(0, 0) + hradius : number or SymPy expression, optional + vradius : number or SymPy expression, optional + eccentricity : number or SymPy expression, optional + Two of `hradius`, `vradius` and `eccentricity` must be supplied to + create an Ellipse. The third is derived from the two supplied. + + Attributes + ========== + + center + hradius + vradius + area + circumference + eccentricity + periapsis + apoapsis + focus_distance + foci + + Raises + ====== + + GeometryError + When `hradius`, `vradius` and `eccentricity` are incorrectly supplied + as parameters. + TypeError + When `center` is not a Point. + + See Also + ======== + + Circle + + Notes + ----- + Constructed from a center and two radii, the first being the horizontal + radius (along the x-axis) and the second being the vertical radius (along + the y-axis). + + When symbolic value for hradius and vradius are used, any calculation that + refers to the foci or the major or minor axis will assume that the ellipse + has its major radius on the x-axis. If this is not true then a manual + rotation is necessary. + + Examples + ======== + + >>> from sympy import Ellipse, Point, Rational + >>> e1 = Ellipse(Point(0, 0), 5, 1) + >>> e1.hradius, e1.vradius + (5, 1) + >>> e2 = Ellipse(Point(3, 1), hradius=3, eccentricity=Rational(4, 5)) + >>> e2 + Ellipse(Point2D(3, 1), 3, 9/5) + + """ + + def __contains__(self, o): + if isinstance(o, Point): + res = self.equation(x, y).subs({x: o.x, y: o.y}) + return trigsimp(simplify(res)) is S.Zero + elif isinstance(o, Ellipse): + return self == o + return False + + def __eq__(self, o): + """Is the other GeometryEntity the same as this ellipse?""" + return isinstance(o, Ellipse) and (self.center == o.center and + self.hradius == o.hradius and + self.vradius == o.vradius) + + def __hash__(self): + return super().__hash__() + + def __new__( + cls, center=None, hradius=None, vradius=None, eccentricity=None, **kwargs): + + hradius = sympify(hradius) + vradius = sympify(vradius) + + if center is None: + center = Point(0, 0) + else: + if len(center) != 2: + raise ValueError('The center of "{}" must be a two dimensional point'.format(cls)) + center = Point(center, dim=2) + + if len(list(filter(lambda x: x is not None, (hradius, vradius, eccentricity)))) != 2: + raise ValueError(filldedent(''' + Exactly two arguments of "hradius", "vradius", and + "eccentricity" must not be None.''')) + + if eccentricity is not None: + eccentricity = sympify(eccentricity) + if eccentricity.is_negative: + raise GeometryError("Eccentricity of ellipse/circle should lie between [0, 1)") + elif hradius is None: + hradius = vradius / sqrt(1 - eccentricity**2) + elif vradius is None: + vradius = hradius * sqrt(1 - eccentricity**2) + + if hradius == vradius: + return Circle(center, hradius, **kwargs) + + if S.Zero in (hradius, vradius): + return Segment(Point(center[0] - hradius, center[1] - vradius), Point(center[0] + hradius, center[1] + vradius)) + + if hradius.is_real is False or vradius.is_real is False: + raise GeometryError("Invalid value encountered when computing hradius / vradius.") + + return GeometryEntity.__new__(cls, center, hradius, vradius, **kwargs) + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG ellipse element for the Ellipse. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + + c = N(self.center) + h, v = N(self.hradius), N(self.vradius) + return ( + '' + ).format(2. * scale_factor, fill_color, c.x, c.y, h, v) + + @property + def ambient_dimension(self): + return 2 + + @property + def apoapsis(self): + """The apoapsis of the ellipse. + + The greatest distance between the focus and the contour. + + Returns + ======= + + apoapsis : number + + See Also + ======== + + periapsis : Returns shortest distance between foci and contour + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.apoapsis + 2*sqrt(2) + 3 + + """ + return self.major * (1 + self.eccentricity) + + def arbitrary_point(self, parameter='t'): + """A parameterized point on the ellipse. + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + arbitrary_point : Point + + Raises + ====== + + ValueError + When `parameter` already appears in the functions. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e1 = Ellipse(Point(0, 0), 3, 2) + >>> e1.arbitrary_point() + Point2D(3*cos(t), 2*sin(t)) + + """ + t = _symbol(parameter, real=True) + if t.name in (f.name for f in self.free_symbols): + raise ValueError(filldedent('Symbol %s already appears in object ' + 'and cannot be used as a parameter.' % t.name)) + return Point(self.center.x + self.hradius*cos(t), + self.center.y + self.vradius*sin(t)) + + @property + def area(self): + """The area of the ellipse. + + Returns + ======= + + area : number + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.area + 3*pi + + """ + return simplify(S.Pi * self.hradius * self.vradius) + + @property + def bounds(self): + """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding + rectangle for the geometric figure. + + """ + + h, v = self.hradius, self.vradius + return (self.center.x - h, self.center.y - v, self.center.x + h, self.center.y + v) + + @property + def center(self): + """The center of the ellipse. + + Returns + ======= + + center : number + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.center + Point2D(0, 0) + + """ + return self.args[0] + + @property + def circumference(self): + """The circumference of the ellipse. + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.circumference + 12*elliptic_e(8/9) + + """ + if self.eccentricity == 1: + # degenerate + return 4*self.major + elif self.eccentricity == 0: + # circle + return 2*pi*self.hradius + else: + return 4*self.major*elliptic_e(self.eccentricity**2) + + @property + def eccentricity(self): + """The eccentricity of the ellipse. + + Returns + ======= + + eccentricity : number + + Examples + ======== + + >>> from sympy import Point, Ellipse, sqrt + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, sqrt(2)) + >>> e1.eccentricity + sqrt(7)/3 + + """ + return self.focus_distance / self.major + + def encloses_point(self, p): + """ + Return True if p is enclosed by (is inside of) self. + + Notes + ----- + Being on the border of self is considered False. + + Parameters + ========== + + p : Point + + Returns + ======= + + encloses_point : True, False or None + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Ellipse, S + >>> from sympy.abc import t + >>> e = Ellipse((0, 0), 3, 2) + >>> e.encloses_point((0, 0)) + True + >>> e.encloses_point(e.arbitrary_point(t).subs(t, S.Half)) + False + >>> e.encloses_point((4, 0)) + False + + """ + p = Point(p, dim=2) + if p in self: + return False + + if len(self.foci) == 2: + # if the combined distance from the foci to p (h1 + h2) is less + # than the combined distance from the foci to the minor axis + # (which is the same as the major axis length) then p is inside + # the ellipse + h1, h2 = [f.distance(p) for f in self.foci] + test = 2*self.major - (h1 + h2) + else: + test = self.radius - self.center.distance(p) + + return fuzzy_bool(test.is_positive) + + def equation(self, x='x', y='y', _slope=None): + """ + Returns the equation of an ellipse aligned with the x and y axes; + when slope is given, the equation returned corresponds to an ellipse + with a major axis having that slope. + + Parameters + ========== + + x : str, optional + Label for the x-axis. Default value is 'x'. + y : str, optional + Label for the y-axis. Default value is 'y'. + _slope : Expr, optional + The slope of the major axis. Ignored when 'None'. + + Returns + ======= + + equation : SymPy expression + + See Also + ======== + + arbitrary_point : Returns parameterized point on ellipse + + Examples + ======== + + >>> from sympy import Point, Ellipse, pi + >>> from sympy.abc import x, y + >>> e1 = Ellipse(Point(1, 0), 3, 2) + >>> eq1 = e1.equation(x, y); eq1 + y**2/4 + (x/3 - 1/3)**2 - 1 + >>> eq2 = e1.equation(x, y, _slope=1); eq2 + (-x + y + 1)**2/8 + (x + y - 1)**2/18 - 1 + + A point on e1 satisfies eq1. Let's use one on the x-axis: + + >>> p1 = e1.center + Point(e1.major, 0) + >>> assert eq1.subs(x, p1.x).subs(y, p1.y) == 0 + + When rotated the same as the rotated ellipse, about the center + point of the ellipse, it will satisfy the rotated ellipse's + equation, too: + + >>> r1 = p1.rotate(pi/4, e1.center) + >>> assert eq2.subs(x, r1.x).subs(y, r1.y) == 0 + + References + ========== + + .. [1] https://math.stackexchange.com/questions/108270/what-is-the-equation-of-an-ellipse-that-is-not-aligned-with-the-axis + .. [2] https://en.wikipedia.org/wiki/Ellipse#Shifted_ellipse + + """ + + x = _symbol(x, real=True) + y = _symbol(y, real=True) + + dx = x - self.center.x + dy = y - self.center.y + + if _slope is not None: + L = (dy - _slope*dx)**2 + l = (_slope*dy + dx)**2 + h = 1 + _slope**2 + b = h*self.major**2 + a = h*self.minor**2 + return l/b + L/a - 1 + + else: + t1 = (dx/self.hradius)**2 + t2 = (dy/self.vradius)**2 + return t1 + t2 - 1 + + def evolute(self, x='x', y='y'): + """The equation of evolute of the ellipse. + + Parameters + ========== + + x : str, optional + Label for the x-axis. Default value is 'x'. + y : str, optional + Label for the y-axis. Default value is 'y'. + + Returns + ======= + + equation : SymPy expression + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e1 = Ellipse(Point(1, 0), 3, 2) + >>> e1.evolute() + 2**(2/3)*y**(2/3) + (3*x - 3)**(2/3) - 5**(2/3) + """ + if len(self.args) != 3: + raise NotImplementedError('Evolute of arbitrary Ellipse is not supported.') + x = _symbol(x, real=True) + y = _symbol(y, real=True) + t1 = (self.hradius*(x - self.center.x))**Rational(2, 3) + t2 = (self.vradius*(y - self.center.y))**Rational(2, 3) + return t1 + t2 - (self.hradius**2 - self.vradius**2)**Rational(2, 3) + + @property + def foci(self): + """The foci of the ellipse. + + Notes + ----- + The foci can only be calculated if the major/minor axes are known. + + Raises + ====== + + ValueError + When the major and minor axis cannot be determined. + + See Also + ======== + + sympy.geometry.point.Point + focus_distance : Returns the distance between focus and center + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.foci + (Point2D(-2*sqrt(2), 0), Point2D(2*sqrt(2), 0)) + + """ + c = self.center + hr, vr = self.hradius, self.vradius + if hr == vr: + return (c, c) + + # calculate focus distance manually, since focus_distance calls this + # routine + fd = sqrt(self.major**2 - self.minor**2) + if hr == self.minor: + # foci on the y-axis + return (c + Point(0, -fd), c + Point(0, fd)) + elif hr == self.major: + # foci on the x-axis + return (c + Point(-fd, 0), c + Point(fd, 0)) + + @property + def focus_distance(self): + """The focal distance of the ellipse. + + The distance between the center and one focus. + + Returns + ======= + + focus_distance : number + + See Also + ======== + + foci + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.focus_distance + 2*sqrt(2) + + """ + return Point.distance(self.center, self.foci[0]) + + @property + def hradius(self): + """The horizontal radius of the ellipse. + + Returns + ======= + + hradius : number + + See Also + ======== + + vradius, major, minor + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.hradius + 3 + + """ + return self.args[1] + + def intersection(self, o): + """The intersection of this ellipse and another geometrical entity + `o`. + + Parameters + ========== + + o : GeometryEntity + + Returns + ======= + + intersection : list of GeometryEntity objects + + Notes + ----- + Currently supports intersections with Point, Line, Segment, Ray, + Circle and Ellipse types. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity + + Examples + ======== + + >>> from sympy import Ellipse, Point, Line + >>> e = Ellipse(Point(0, 0), 5, 7) + >>> e.intersection(Point(0, 0)) + [] + >>> e.intersection(Point(5, 0)) + [Point2D(5, 0)] + >>> e.intersection(Line(Point(0,0), Point(0, 1))) + [Point2D(0, -7), Point2D(0, 7)] + >>> e.intersection(Line(Point(5,0), Point(5, 1))) + [Point2D(5, 0)] + >>> e.intersection(Line(Point(6,0), Point(6, 1))) + [] + >>> e = Ellipse(Point(-1, 0), 4, 3) + >>> e.intersection(Ellipse(Point(1, 0), 4, 3)) + [Point2D(0, -3*sqrt(15)/4), Point2D(0, 3*sqrt(15)/4)] + >>> e.intersection(Ellipse(Point(5, 0), 4, 3)) + [Point2D(2, -3*sqrt(7)/4), Point2D(2, 3*sqrt(7)/4)] + >>> e.intersection(Ellipse(Point(100500, 0), 4, 3)) + [] + >>> e.intersection(Ellipse(Point(0, 0), 3, 4)) + [Point2D(3, 0), Point2D(-363/175, -48*sqrt(111)/175), Point2D(-363/175, 48*sqrt(111)/175)] + >>> e.intersection(Ellipse(Point(-1, 0), 3, 4)) + [Point2D(-17/5, -12/5), Point2D(-17/5, 12/5), Point2D(7/5, -12/5), Point2D(7/5, 12/5)] + """ + # TODO: Replace solve with nonlinsolve, when nonlinsolve will be able to solve in real domain + + if isinstance(o, Point): + if o in self: + return [o] + else: + return [] + + elif isinstance(o, (Segment2D, Ray2D)): + ellipse_equation = self.equation(x, y) + result = solve([ellipse_equation, Line( + o.points[0], o.points[1]).equation(x, y)], [x, y], + set=True)[1] + return list(ordered([Point(i) for i in result if i in o])) + + elif isinstance(o, Polygon): + return o.intersection(self) + + elif isinstance(o, (Ellipse, Line2D)): + if o == self: + return self + else: + ellipse_equation = self.equation(x, y) + return list(ordered([Point(i) for i in solve( + [ellipse_equation, o.equation(x, y)], [x, y], + set=True)[1]])) + elif isinstance(o, LinearEntity3D): + raise TypeError('Entity must be two dimensional, not three dimensional') + else: + raise TypeError('Intersection not handled for %s' % func_name(o)) + + def is_tangent(self, o): + """Is `o` tangent to the ellipse? + + Parameters + ========== + + o : GeometryEntity + An Ellipse, LinearEntity or Polygon + + Raises + ====== + + NotImplementedError + When the wrong type of argument is supplied. + + Returns + ======= + + is_tangent: boolean + True if o is tangent to the ellipse, False otherwise. + + See Also + ======== + + tangent_lines + + Examples + ======== + + >>> from sympy import Point, Ellipse, Line + >>> p0, p1, p2 = Point(0, 0), Point(3, 0), Point(3, 3) + >>> e1 = Ellipse(p0, 3, 2) + >>> l1 = Line(p1, p2) + >>> e1.is_tangent(l1) + True + + """ + if isinstance(o, Point2D): + return False + elif isinstance(o, Ellipse): + intersect = self.intersection(o) + if isinstance(intersect, Ellipse): + return True + elif intersect: + return all((self.tangent_lines(i)[0]).equals(o.tangent_lines(i)[0]) for i in intersect) + else: + return False + elif isinstance(o, Line2D): + hit = self.intersection(o) + if not hit: + return False + if len(hit) == 1: + return True + # might return None if it can't decide + return hit[0].equals(hit[1]) + elif isinstance(o, (Segment2D, Ray2D)): + intersect = self.intersection(o) + if len(intersect) == 1: + return o in self.tangent_lines(intersect[0])[0] + else: + return False + elif isinstance(o, Polygon): + return all(self.is_tangent(s) for s in o.sides) + elif isinstance(o, (LinearEntity3D, Point3D)): + raise TypeError('Entity must be two dimensional, not three dimensional') + else: + raise TypeError('Is_tangent not handled for %s' % func_name(o)) + + @property + def major(self): + """Longer axis of the ellipse (if it can be determined) else hradius. + + Returns + ======= + + major : number or expression + + See Also + ======== + + hradius, vradius, minor + + Examples + ======== + + >>> from sympy import Point, Ellipse, Symbol + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.major + 3 + + >>> a = Symbol('a') + >>> b = Symbol('b') + >>> Ellipse(p1, a, b).major + a + >>> Ellipse(p1, b, a).major + b + + >>> m = Symbol('m') + >>> M = m + 1 + >>> Ellipse(p1, m, M).major + m + 1 + + """ + ab = self.args[1:3] + if len(ab) == 1: + return ab[0] + a, b = ab + o = b - a < 0 + if o == True: + return a + elif o == False: + return b + return self.hradius + + @property + def minor(self): + """Shorter axis of the ellipse (if it can be determined) else vradius. + + Returns + ======= + + minor : number or expression + + See Also + ======== + + hradius, vradius, major + + Examples + ======== + + >>> from sympy import Point, Ellipse, Symbol + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.minor + 1 + + >>> a = Symbol('a') + >>> b = Symbol('b') + >>> Ellipse(p1, a, b).minor + b + >>> Ellipse(p1, b, a).minor + a + + >>> m = Symbol('m') + >>> M = m + 1 + >>> Ellipse(p1, m, M).minor + m + + """ + ab = self.args[1:3] + if len(ab) == 1: + return ab[0] + a, b = ab + o = a - b < 0 + if o == True: + return a + elif o == False: + return b + return self.vradius + + def normal_lines(self, p, prec=None): + """Normal lines between `p` and the ellipse. + + Parameters + ========== + + p : Point + + Returns + ======= + + normal_lines : list with 1, 2 or 4 Lines + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e = Ellipse((0, 0), 2, 3) + >>> c = e.center + >>> e.normal_lines(c + Point(1, 0)) + [Line2D(Point2D(0, 0), Point2D(1, 0))] + >>> e.normal_lines(c) + [Line2D(Point2D(0, 0), Point2D(0, 1)), Line2D(Point2D(0, 0), Point2D(1, 0))] + + Off-axis points require the solution of a quartic equation. This + often leads to very large expressions that may be of little practical + use. An approximate solution of `prec` digits can be obtained by + passing in the desired value: + + >>> e.normal_lines((3, 3), prec=2) + [Line2D(Point2D(-0.81, -2.7), Point2D(0.19, -1.2)), + Line2D(Point2D(1.5, -2.0), Point2D(2.5, -2.7))] + + Whereas the above solution has an operation count of 12, the exact + solution has an operation count of 2020. + """ + p = Point(p, dim=2) + + # XXX change True to something like self.angle == 0 if the arbitrarily + # rotated ellipse is introduced. + # https://github.com/sympy/sympy/issues/2815) + if True: + rv = [] + if p.x == self.center.x: + rv.append(Line(self.center, slope=oo)) + if p.y == self.center.y: + rv.append(Line(self.center, slope=0)) + if rv: + # at these special orientations of p either 1 or 2 normals + # exist and we are done + return rv + + # find the 4 normal points and construct lines through them with + # the corresponding slope + eq = self.equation(x, y) + dydx = idiff(eq, y, x) + norm = -1/dydx + slope = Line(p, (x, y)).slope + seq = slope - norm + + # TODO: Replace solve with solveset, when this line is tested + yis = solve(seq, y)[0] + xeq = eq.subs(y, yis).as_numer_denom()[0].expand() + if len(xeq.free_symbols) == 1: + try: + # this is so much faster, it's worth a try + xsol = Poly(xeq, x).real_roots() + except (DomainError, PolynomialError, NotImplementedError): + # TODO: Replace solve with solveset, when these lines are tested + xsol = _nsort(solve(xeq, x), separated=True)[0] + points = [Point(i, solve(eq.subs(x, i), y)[0]) for i in xsol] + else: + raise NotImplementedError( + 'intersections for the general ellipse are not supported') + slopes = [norm.subs(zip((x, y), pt.args)) for pt in points] + if prec is not None: + points = [pt.n(prec) for pt in points] + slopes = [i if _not_a_coeff(i) else i.n(prec) for i in slopes] + return [Line(pt, slope=s) for pt, s in zip(points, slopes)] + + @property + def periapsis(self): + """The periapsis of the ellipse. + + The shortest distance between the focus and the contour. + + Returns + ======= + + periapsis : number + + See Also + ======== + + apoapsis : Returns greatest distance between focus and contour + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.periapsis + 3 - 2*sqrt(2) + + """ + return self.major * (1 - self.eccentricity) + + @property + def semilatus_rectum(self): + """ + Calculates the semi-latus rectum of the Ellipse. + + Semi-latus rectum is defined as one half of the chord through a + focus parallel to the conic section directrix of a conic section. + + Returns + ======= + + semilatus_rectum : number + + See Also + ======== + + apoapsis : Returns greatest distance between focus and contour + + periapsis : The shortest distance between the focus and the contour + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.semilatus_rectum + 1/3 + + References + ========== + + .. [1] https://mathworld.wolfram.com/SemilatusRectum.html + .. [2] https://en.wikipedia.org/wiki/Ellipse#Semi-latus_rectum + + """ + return self.major * (1 - self.eccentricity ** 2) + + def auxiliary_circle(self): + """Returns a Circle whose diameter is the major axis of the ellipse. + + Examples + ======== + + >>> from sympy import Ellipse, Point, symbols + >>> c = Point(1, 2) + >>> Ellipse(c, 8, 7).auxiliary_circle() + Circle(Point2D(1, 2), 8) + >>> a, b = symbols('a b') + >>> Ellipse(c, a, b).auxiliary_circle() + Circle(Point2D(1, 2), Max(a, b)) + """ + return Circle(self.center, Max(self.hradius, self.vradius)) + + def director_circle(self): + """ + Returns a Circle consisting of all points where two perpendicular + tangent lines to the ellipse cross each other. + + Returns + ======= + + Circle + A director circle returned as a geometric object. + + Examples + ======== + + >>> from sympy import Ellipse, Point, symbols + >>> c = Point(3,8) + >>> Ellipse(c, 7, 9).director_circle() + Circle(Point2D(3, 8), sqrt(130)) + >>> a, b = symbols('a b') + >>> Ellipse(c, a, b).director_circle() + Circle(Point2D(3, 8), sqrt(a**2 + b**2)) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Director_circle + + """ + return Circle(self.center, sqrt(self.hradius**2 + self.vradius**2)) + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of the Ellipse. + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + plot_interval : list + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e1 = Ellipse(Point(0, 0), 3, 2) + >>> e1.plot_interval() + [t, -pi, pi] + + """ + t = _symbol(parameter, real=True) + return [t, -S.Pi, S.Pi] + + def random_point(self, seed=None): + """A random point on the ellipse. + + Returns + ======= + + point : Point + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e1 = Ellipse(Point(0, 0), 3, 2) + >>> e1.random_point() # gives some random point + Point2D(...) + >>> p1 = e1.random_point(seed=0); p1.n(2) + Point2D(2.1, 1.4) + + Notes + ===== + + When creating a random point, one may simply replace the + parameter with a random number. When doing so, however, the + random number should be made a Rational or else the point + may not test as being in the ellipse: + + >>> from sympy.abc import t + >>> from sympy import Rational + >>> arb = e1.arbitrary_point(t); arb + Point2D(3*cos(t), 2*sin(t)) + >>> arb.subs(t, .1) in e1 + False + >>> arb.subs(t, Rational(.1)) in e1 + True + >>> arb.subs(t, Rational('.1')) in e1 + True + + See Also + ======== + sympy.geometry.point.Point + arbitrary_point : Returns parameterized point on ellipse + """ + t = _symbol('t', real=True) + x, y = self.arbitrary_point(t).args + # get a random value in [-1, 1) corresponding to cos(t) + # and confirm that it will test as being in the ellipse + if seed is not None: + rng = random.Random(seed) + else: + rng = random + # simplify this now or else the Float will turn s into a Float + r = Rational(rng.random()) + c = 2*r - 1 + s = sqrt(1 - c**2) + return Point(x.subs(cos(t), c), y.subs(sin(t), s)) + + def reflect(self, line): + """Override GeometryEntity.reflect since the radius + is not a GeometryEntity. + + Examples + ======== + + >>> from sympy import Circle, Line + >>> Circle((0, 1), 1).reflect(Line((0, 0), (1, 1))) + Circle(Point2D(1, 0), -1) + >>> from sympy import Ellipse, Line, Point + >>> Ellipse(Point(3, 4), 1, 3).reflect(Line(Point(0, -4), Point(5, 0))) + Traceback (most recent call last): + ... + NotImplementedError: + General Ellipse is not supported but the equation of the reflected + Ellipse is given by the zeros of: f(x, y) = (9*x/41 + 40*y/41 + + 37/41)**2 + (40*x/123 - 3*y/41 - 364/123)**2 - 1 + + Notes + ===== + + Until the general ellipse (with no axis parallel to the x-axis) is + supported a NotImplemented error is raised and the equation whose + zeros define the rotated ellipse is given. + + """ + + if line.slope in (0, oo): + c = self.center + c = c.reflect(line) + return self.func(c, -self.hradius, self.vradius) + else: + x, y = [uniquely_named_symbol( + name, (self, line), modify=lambda s: '_' + s, real=True) + for name in 'xy'] + expr = self.equation(x, y) + p = Point(x, y).reflect(line) + result = expr.subs(zip((x, y), p.args + ), simultaneous=True) + raise NotImplementedError(filldedent( + 'General Ellipse is not supported but the equation ' + 'of the reflected Ellipse is given by the zeros of: ' + + "f(%s, %s) = %s" % (str(x), str(y), str(result)))) + + def rotate(self, angle=0, pt=None): + """Rotate ``angle`` radians counterclockwise about Point ``pt``. + + Note: since the general ellipse is not supported, only rotations that + are integer multiples of pi/2 are allowed. + + Examples + ======== + + >>> from sympy import Ellipse, pi + >>> Ellipse((1, 0), 2, 1).rotate(pi/2) + Ellipse(Point2D(0, 1), 1, 2) + >>> Ellipse((1, 0), 2, 1).rotate(pi) + Ellipse(Point2D(-1, 0), 2, 1) + """ + if self.hradius == self.vradius: + return self.func(self.center.rotate(angle, pt), self.hradius) + if (angle/S.Pi).is_integer: + return super().rotate(angle, pt) + if (2*angle/S.Pi).is_integer: + return self.func(self.center.rotate(angle, pt), self.vradius, self.hradius) + # XXX see https://github.com/sympy/sympy/issues/2815 for general ellipes + raise NotImplementedError('Only rotations of pi/2 are currently supported for Ellipse.') + + def scale(self, x=1, y=1, pt=None): + """Override GeometryEntity.scale since it is the major and minor + axes which must be scaled and they are not GeometryEntities. + + Examples + ======== + + >>> from sympy import Ellipse + >>> Ellipse((0, 0), 2, 1).scale(2, 4) + Circle(Point2D(0, 0), 4) + >>> Ellipse((0, 0), 2, 1).scale(2) + Ellipse(Point2D(0, 0), 4, 1) + """ + c = self.center + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + h = self.hradius + v = self.vradius + return self.func(c.scale(x, y), hradius=h*x, vradius=v*y) + + def tangent_lines(self, p): + """Tangent lines between `p` and the ellipse. + + If `p` is on the ellipse, returns the tangent line through point `p`. + Otherwise, returns the tangent line(s) from `p` to the ellipse, or + None if no tangent line is possible (e.g., `p` inside ellipse). + + Parameters + ========== + + p : Point + + Returns + ======= + + tangent_lines : list with 1 or 2 Lines + + Raises + ====== + + NotImplementedError + Can only find tangent lines for a point, `p`, on the ellipse. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Line + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> e1 = Ellipse(Point(0, 0), 3, 2) + >>> e1.tangent_lines(Point(3, 0)) + [Line2D(Point2D(3, 0), Point2D(3, -12))] + + """ + p = Point(p, dim=2) + if self.encloses_point(p): + return [] + + if p in self: + delta = self.center - p + rise = (self.vradius**2)*delta.x + run = -(self.hradius**2)*delta.y + p2 = Point(simplify(p.x + run), + simplify(p.y + rise)) + return [Line(p, p2)] + else: + if len(self.foci) == 2: + f1, f2 = self.foci + maj = self.hradius + test = (2*maj - + Point.distance(f1, p) - + Point.distance(f2, p)) + else: + test = self.radius - Point.distance(self.center, p) + if test.is_number and test.is_positive: + return [] + # else p is outside the ellipse or we can't tell. In case of the + # latter, the solutions returned will only be valid if + # the point is not inside the ellipse; if it is, nan will result. + eq = self.equation(x, y) + dydx = idiff(eq, y, x) + slope = Line(p, Point(x, y)).slope + + # TODO: Replace solve with solveset, when this line is tested + tangent_points = solve([slope - dydx, eq], [x, y]) + + # handle horizontal and vertical tangent lines + if len(tangent_points) == 1: + if tangent_points[0][ + 0] == p.x or tangent_points[0][1] == p.y: + return [Line(p, p + Point(1, 0)), Line(p, p + Point(0, 1))] + else: + return [Line(p, p + Point(0, 1)), Line(p, tangent_points[0])] + + # others + return [Line(p, tangent_points[0]), Line(p, tangent_points[1])] + + @property + def vradius(self): + """The vertical radius of the ellipse. + + Returns + ======= + + vradius : number + + See Also + ======== + + hradius, major, minor + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.vradius + 1 + + """ + return self.args[2] + + + def second_moment_of_area(self, point=None): + """Returns the second moment and product moment area of an ellipse. + + Parameters + ========== + + point : Point, two-tuple of sympifiable objects, or None(default=None) + point is the point about which second moment of area is to be found. + If "point=None" it will be calculated about the axis passing through the + centroid of the ellipse. + + Returns + ======= + + I_xx, I_yy, I_xy : number or SymPy expression + I_xx, I_yy are second moment of area of an ellise. + I_xy is product moment of area of an ellipse. + + Examples + ======== + + >>> from sympy import Point, Ellipse + >>> p1 = Point(0, 0) + >>> e1 = Ellipse(p1, 3, 1) + >>> e1.second_moment_of_area() + (3*pi/4, 27*pi/4, 0) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/List_of_second_moments_of_area + + """ + + I_xx = (S.Pi*(self.hradius)*(self.vradius**3))/4 + I_yy = (S.Pi*(self.hradius**3)*(self.vradius))/4 + I_xy = 0 + + if point is None: + return I_xx, I_yy, I_xy + + # parallel axis theorem + I_xx = I_xx + self.area*((point[1] - self.center.y)**2) + I_yy = I_yy + self.area*((point[0] - self.center.x)**2) + I_xy = I_xy + self.area*(point[0] - self.center.x)*(point[1] - self.center.y) + + return I_xx, I_yy, I_xy + + + def polar_second_moment_of_area(self): + """Returns the polar second moment of area of an Ellipse + + It is a constituent of the second moment of area, linked through + the perpendicular axis theorem. While the planar second moment of + area describes an object's resistance to deflection (bending) when + subjected to a force applied to a plane parallel to the central + axis, the polar second moment of area describes an object's + resistance to deflection when subjected to a moment applied in a + plane perpendicular to the object's central axis (i.e. parallel to + the cross-section) + + Examples + ======== + + >>> from sympy import symbols, Circle, Ellipse + >>> c = Circle((5, 5), 4) + >>> c.polar_second_moment_of_area() + 128*pi + >>> a, b = symbols('a, b') + >>> e = Ellipse((0, 0), a, b) + >>> e.polar_second_moment_of_area() + pi*a**3*b/4 + pi*a*b**3/4 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Polar_moment_of_inertia + + """ + second_moment = self.second_moment_of_area() + return second_moment[0] + second_moment[1] + + + def section_modulus(self, point=None): + """Returns a tuple with the section modulus of an ellipse + + Section modulus is a geometric property of an ellipse defined as the + ratio of second moment of area to the distance of the extreme end of + the ellipse from the centroidal axis. + + Parameters + ========== + + point : Point, two-tuple of sympifyable objects, or None(default=None) + point is the point at which section modulus is to be found. + If "point=None" section modulus will be calculated for the + point farthest from the centroidal axis of the ellipse. + + Returns + ======= + + S_x, S_y: numbers or SymPy expressions + S_x is the section modulus with respect to the x-axis + S_y is the section modulus with respect to the y-axis + A negative sign indicates that the section modulus is + determined for a point below the centroidal axis. + + Examples + ======== + + >>> from sympy import Symbol, Ellipse, Circle, Point2D + >>> d = Symbol('d', positive=True) + >>> c = Circle((0, 0), d/2) + >>> c.section_modulus() + (pi*d**3/32, pi*d**3/32) + >>> e = Ellipse(Point2D(0, 0), 2, 4) + >>> e.section_modulus() + (8*pi, 4*pi) + >>> e.section_modulus((2, 2)) + (16*pi, 4*pi) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Section_modulus + + """ + x_c, y_c = self.center + if point is None: + # taking x and y as maximum distances from centroid + x_min, y_min, x_max, y_max = self.bounds + y = max(y_c - y_min, y_max - y_c) + x = max(x_c - x_min, x_max - x_c) + else: + # taking x and y as distances of the given point from the center + point = Point2D(point) + y = point.y - y_c + x = point.x - x_c + + second_moment = self.second_moment_of_area() + S_x = second_moment[0]/y + S_y = second_moment[1]/x + + return S_x, S_y + + +class Circle(Ellipse): + r"""A circle in space. + + Constructed simply from a center and a radius, from three + non-collinear points, or the equation of a circle. + + Parameters + ========== + + center : Point + radius : number or SymPy expression + points : sequence of three Points + equation : equation of a circle + + Attributes + ========== + + radius (synonymous with hradius, vradius, major and minor) + circumference + equation + + Raises + ====== + + GeometryError + When the given equation is not that of a circle. + When trying to construct circle from incorrect parameters. + + See Also + ======== + + Ellipse, sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Circle, Eq + >>> from sympy.abc import x, y, a, b + + A circle constructed from a center and radius: + + >>> c1 = Circle(Point(0, 0), 5) + >>> c1.hradius, c1.vradius, c1.radius + (5, 5, 5) + + A circle constructed from three points: + + >>> c2 = Circle(Point(0, 0), Point(1, 1), Point(1, 0)) + >>> c2.hradius, c2.vradius, c2.radius, c2.center + (sqrt(2)/2, sqrt(2)/2, sqrt(2)/2, Point2D(1/2, 1/2)) + + A circle can be constructed from an equation in the form + `ax^2 + by^2 + gx + hy + c = 0`, too: + + >>> Circle(x**2 + y**2 - 25) + Circle(Point2D(0, 0), 5) + + If the variables corresponding to x and y are named something + else, their name or symbol can be supplied: + + >>> Circle(Eq(a**2 + b**2, 25), x='a', y=b) + Circle(Point2D(0, 0), 5) + """ + + def __new__(cls, *args, **kwargs): + evaluate = kwargs.get('evaluate', global_parameters.evaluate) + if len(args) == 1 and isinstance(args[0], (Expr, Eq)): + x = kwargs.get('x', 'x') + y = kwargs.get('y', 'y') + equation = args[0].expand() + if isinstance(equation, Eq): + equation = equation.lhs - equation.rhs + x = find(x, equation) + y = find(y, equation) + + try: + a, b, c, d, e = linear_coeffs(equation, x**2, y**2, x, y) + except ValueError: + raise GeometryError("The given equation is not that of a circle.") + + if S.Zero in (a, b) or a != b: + raise GeometryError("The given equation is not that of a circle.") + + center_x = -c/a/2 + center_y = -d/b/2 + r2 = (center_x**2) + (center_y**2) - e/a + + return Circle((center_x, center_y), sqrt(r2), evaluate=evaluate) + + else: + c, r = None, None + if len(args) == 3: + args = [Point(a, dim=2, evaluate=evaluate) for a in args] + t = Triangle(*args) + if not isinstance(t, Triangle): + return t + c = t.circumcenter + r = t.circumradius + elif len(args) == 2: + # Assume (center, radius) pair + c = Point(args[0], dim=2, evaluate=evaluate) + r = args[1] + # this will prohibit imaginary radius + try: + r = Point(r, 0, evaluate=evaluate).x + except ValueError: + raise GeometryError("Circle with imaginary radius is not permitted") + + if not (c is None or r is None): + if r == 0: + return c + return GeometryEntity.__new__(cls, c, r, **kwargs) + + raise GeometryError("Circle.__new__ received unknown arguments") + + def _eval_evalf(self, prec=15, **options): + pt, r = self.args + dps = prec_to_dps(prec) + pt = pt.evalf(n=dps, **options) + r = r.evalf(n=dps, **options) + return self.func(pt, r, evaluate=False) + + @property + def circumference(self): + """The circumference of the circle. + + Returns + ======= + + circumference : number or SymPy expression + + Examples + ======== + + >>> from sympy import Point, Circle + >>> c1 = Circle(Point(3, 4), 6) + >>> c1.circumference + 12*pi + + """ + return 2 * S.Pi * self.radius + + def equation(self, x='x', y='y'): + """The equation of the circle. + + Parameters + ========== + + x : str or Symbol, optional + Default value is 'x'. + y : str or Symbol, optional + Default value is 'y'. + + Returns + ======= + + equation : SymPy expression + + Examples + ======== + + >>> from sympy import Point, Circle + >>> c1 = Circle(Point(0, 0), 5) + >>> c1.equation() + x**2 + y**2 - 25 + + """ + x = _symbol(x, real=True) + y = _symbol(y, real=True) + t1 = (x - self.center.x)**2 + t2 = (y - self.center.y)**2 + return t1 + t2 - self.major**2 + + def intersection(self, o): + """The intersection of this circle with another geometrical entity. + + Parameters + ========== + + o : GeometryEntity + + Returns + ======= + + intersection : list of GeometryEntities + + Examples + ======== + + >>> from sympy import Point, Circle, Line, Ray + >>> p1, p2, p3 = Point(0, 0), Point(5, 5), Point(6, 0) + >>> p4 = Point(5, 0) + >>> c1 = Circle(p1, 5) + >>> c1.intersection(p2) + [] + >>> c1.intersection(p4) + [Point2D(5, 0)] + >>> c1.intersection(Ray(p1, p2)) + [Point2D(5*sqrt(2)/2, 5*sqrt(2)/2)] + >>> c1.intersection(Line(p2, p3)) + [] + + """ + return Ellipse.intersection(self, o) + + @property + def radius(self): + """The radius of the circle. + + Returns + ======= + + radius : number or SymPy expression + + See Also + ======== + + Ellipse.major, Ellipse.minor, Ellipse.hradius, Ellipse.vradius + + Examples + ======== + + >>> from sympy import Point, Circle + >>> c1 = Circle(Point(3, 4), 6) + >>> c1.radius + 6 + + """ + return self.args[1] + + def reflect(self, line): + """Override GeometryEntity.reflect since the radius + is not a GeometryEntity. + + Examples + ======== + + >>> from sympy import Circle, Line + >>> Circle((0, 1), 1).reflect(Line((0, 0), (1, 1))) + Circle(Point2D(1, 0), -1) + """ + c = self.center + c = c.reflect(line) + return self.func(c, -self.radius) + + def scale(self, x=1, y=1, pt=None): + """Override GeometryEntity.scale since the radius + is not a GeometryEntity. + + Examples + ======== + + >>> from sympy import Circle + >>> Circle((0, 0), 1).scale(2, 2) + Circle(Point2D(0, 0), 2) + >>> Circle((0, 0), 1).scale(2, 4) + Ellipse(Point2D(0, 0), 2, 4) + """ + c = self.center + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + c = c.scale(x, y) + x, y = [abs(i) for i in (x, y)] + if x == y: + return self.func(c, x*self.radius) + h = v = self.radius + return Ellipse(c, hradius=h*x, vradius=v*y) + + @property + def vradius(self): + """ + This Ellipse property is an alias for the Circle's radius. + + Whereas hradius, major and minor can use Ellipse's conventions, + the vradius does not exist for a circle. It is always a positive + value in order that the Circle, like Polygons, will have an + area that can be positive or negative as determined by the sign + of the hradius. + + Examples + ======== + + >>> from sympy import Point, Circle + >>> c1 = Circle(Point(3, 4), 6) + >>> c1.vradius + 6 + """ + return abs(self.radius) + + +from .polygon import Polygon, Triangle diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/entity.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/entity.py new file mode 100644 index 0000000000000000000000000000000000000000..5ea1e807542c43eb955c2d778cec0f101d78bdce --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/entity.py @@ -0,0 +1,641 @@ +"""The definition of the base geometrical entity with attributes common to +all derived geometrical entities. + +Contains +======== + +GeometryEntity +GeometricSet + +Notes +===== + +A GeometryEntity is any object that has special geometric properties. +A GeometrySet is a superclass of any GeometryEntity that can also +be viewed as a sympy.sets.Set. In particular, points are the only +GeometryEntity not considered a Set. + +Rn is a GeometrySet representing n-dimensional Euclidean space. R2 and +R3 are currently the only ambient spaces implemented. + +""" +from __future__ import annotations + +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.evalf import EvalfMixin, N +from sympy.core.numbers import oo +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify +from sympy.functions.elementary.trigonometric import cos, sin, atan +from sympy.matrices import eye +from sympy.multipledispatch import dispatch +from sympy.printing import sstr +from sympy.sets import Set, Union, FiniteSet +from sympy.sets.handlers.intersection import intersection_sets +from sympy.sets.handlers.union import union_sets +from sympy.solvers.solvers import solve +from sympy.utilities.misc import func_name +from sympy.utilities.iterables import is_sequence + + +# How entities are ordered; used by __cmp__ in GeometryEntity +ordering_of_classes = [ + "Point2D", + "Point3D", + "Point", + "Segment2D", + "Ray2D", + "Line2D", + "Segment3D", + "Line3D", + "Ray3D", + "Segment", + "Ray", + "Line", + "Plane", + "Triangle", + "RegularPolygon", + "Polygon", + "Circle", + "Ellipse", + "Curve", + "Parabola" +] + + +x, y = [Dummy('entity_dummy') for i in range(2)] +T = Dummy('entity_dummy', real=True) + + +class GeometryEntity(Basic, EvalfMixin): + """The base class for all geometrical entities. + + This class does not represent any particular geometric entity, it only + provides the implementation of some methods common to all subclasses. + + """ + + __slots__: tuple[str, ...] = () + + def __cmp__(self, other): + """Comparison of two GeometryEntities.""" + n1 = self.__class__.__name__ + n2 = other.__class__.__name__ + c = (n1 > n2) - (n1 < n2) + if not c: + return 0 + + i1 = -1 + for cls in self.__class__.__mro__: + try: + i1 = ordering_of_classes.index(cls.__name__) + break + except ValueError: + i1 = -1 + if i1 == -1: + return c + + i2 = -1 + for cls in other.__class__.__mro__: + try: + i2 = ordering_of_classes.index(cls.__name__) + break + except ValueError: + i2 = -1 + if i2 == -1: + return c + + return (i1 > i2) - (i1 < i2) + + def __contains__(self, other): + """Subclasses should implement this method for anything more complex than equality.""" + if type(self) is type(other): + return self == other + raise NotImplementedError() + + def __getnewargs__(self): + """Returns a tuple that will be passed to __new__ on unpickling.""" + return tuple(self.args) + + def __ne__(self, o): + """Test inequality of two geometrical entities.""" + return not self == o + + def __new__(cls, *args, **kwargs): + # Points are sequences, but they should not + # be converted to Tuples, so use this detection function instead. + def is_seq_and_not_point(a): + # we cannot use isinstance(a, Point) since we cannot import Point + if hasattr(a, 'is_Point') and a.is_Point: + return False + return is_sequence(a) + + args = [Tuple(*a) if is_seq_and_not_point(a) else sympify(a) for a in args] + return Basic.__new__(cls, *args) + + def __radd__(self, a): + """Implementation of reverse add method.""" + return a.__add__(self) + + def __rtruediv__(self, a): + """Implementation of reverse division method.""" + return a.__truediv__(self) + + def __repr__(self): + """String representation of a GeometryEntity that can be evaluated + by sympy.""" + return type(self).__name__ + repr(self.args) + + def __rmul__(self, a): + """Implementation of reverse multiplication method.""" + return a.__mul__(self) + + def __rsub__(self, a): + """Implementation of reverse subtraction method.""" + return a.__sub__(self) + + def __str__(self): + """String representation of a GeometryEntity.""" + return type(self).__name__ + sstr(self.args) + + def _eval_subs(self, old, new): + from sympy.geometry.point import Point, Point3D + if is_sequence(old) or is_sequence(new): + if isinstance(self, Point3D): + old = Point3D(old) + new = Point3D(new) + else: + old = Point(old) + new = Point(new) + return self._subs(old, new) + + def _repr_svg_(self): + """SVG representation of a GeometryEntity suitable for IPython""" + + try: + bounds = self.bounds + except (NotImplementedError, TypeError): + # if we have no SVG representation, return None so IPython + # will fall back to the next representation + return None + + if not all(x.is_number and x.is_finite for x in bounds): + return None + + svg_top = ''' + + + + + + + + + + + ''' + + # Establish SVG canvas that will fit all the data + small space + xmin, ymin, xmax, ymax = map(N, bounds) + if xmin == xmax and ymin == ymax: + # This is a point; buffer using an arbitrary size + xmin, ymin, xmax, ymax = xmin - .5, ymin -.5, xmax + .5, ymax + .5 + else: + # Expand bounds by a fraction of the data ranges + expand = 0.1 # or 10%; this keeps arrowheads in view (R plots use 4%) + widest_part = max([xmax - xmin, ymax - ymin]) + expand_amount = widest_part * expand + xmin -= expand_amount + ymin -= expand_amount + xmax += expand_amount + ymax += expand_amount + dx = xmax - xmin + dy = ymax - ymin + width = min([max([100., dx]), 300]) + height = min([max([100., dy]), 300]) + + scale_factor = 1. if max(width, height) == 0 else max(dx, dy) / max(width, height) + try: + svg = self._svg(scale_factor) + except (NotImplementedError, TypeError): + # if we have no SVG representation, return None so IPython + # will fall back to the next representation + return None + + view_box = "{} {} {} {}".format(xmin, ymin, dx, dy) + transform = "matrix(1,0,0,-1,0,{})".format(ymax + ymin) + svg_top = svg_top.format(view_box, width, height) + + return svg_top + ( + '{}' + ).format(transform, svg) + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG path element for the GeometryEntity. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + raise NotImplementedError() + + def _sympy_(self): + return self + + @property + def ambient_dimension(self): + """What is the dimension of the space that the object is contained in?""" + raise NotImplementedError() + + @property + def bounds(self): + """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding + rectangle for the geometric figure. + + """ + + raise NotImplementedError() + + def encloses(self, o): + """ + Return True if o is inside (not on or outside) the boundaries of self. + + The object will be decomposed into Points and individual Entities need + only define an encloses_point method for their class. + + See Also + ======== + + sympy.geometry.ellipse.Ellipse.encloses_point + sympy.geometry.polygon.Polygon.encloses_point + + Examples + ======== + + >>> from sympy import RegularPolygon, Point, Polygon + >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) + >>> t2 = Polygon(*RegularPolygon(Point(0, 0), 2, 3).vertices) + >>> t2.encloses(t) + True + >>> t.encloses(t2) + False + + """ + + from sympy.geometry.point import Point + from sympy.geometry.line import Segment, Ray, Line + from sympy.geometry.ellipse import Ellipse + from sympy.geometry.polygon import Polygon, RegularPolygon + + if isinstance(o, Point): + return self.encloses_point(o) + elif isinstance(o, Segment): + return all(self.encloses_point(x) for x in o.points) + elif isinstance(o, (Ray, Line)): + return False + elif isinstance(o, Ellipse): + return self.encloses_point(o.center) and \ + self.encloses_point( + Point(o.center.x + o.hradius, o.center.y)) and \ + not self.intersection(o) + elif isinstance(o, Polygon): + if isinstance(o, RegularPolygon): + if not self.encloses_point(o.center): + return False + return all(self.encloses_point(v) for v in o.vertices) + raise NotImplementedError() + + def equals(self, o): + return self == o + + def intersection(self, o): + """ + Returns a list of all of the intersections of self with o. + + Notes + ===== + + An entity is not required to implement this method. + + If two different types of entities can intersect, the item with + higher index in ordering_of_classes should implement + intersections with anything having a lower index. + + See Also + ======== + + sympy.geometry.util.intersection + + """ + raise NotImplementedError() + + def is_similar(self, other): + """Is this geometrical entity similar to another geometrical entity? + + Two entities are similar if a uniform scaling (enlarging or + shrinking) of one of the entities will allow one to obtain the other. + + Notes + ===== + + This method is not intended to be used directly but rather + through the `are_similar` function found in util.py. + An entity is not required to implement this method. + If two different types of entities can be similar, it is only + required that one of them be able to determine this. + + See Also + ======== + + scale + + """ + raise NotImplementedError() + + def reflect(self, line): + """ + Reflects an object across a line. + + Parameters + ========== + + line: Line + + Examples + ======== + + >>> from sympy import pi, sqrt, Line, RegularPolygon + >>> l = Line((0, pi), slope=sqrt(2)) + >>> pent = RegularPolygon((1, 2), 1, 5) + >>> rpent = pent.reflect(l) + >>> rpent + RegularPolygon(Point2D(-2*sqrt(2)*pi/3 - 1/3 + 4*sqrt(2)/3, 2/3 + 2*sqrt(2)/3 + 2*pi/3), -1, 5, -atan(2*sqrt(2)) + 3*pi/5) + + >>> from sympy import pi, Line, Circle, Point + >>> l = Line((0, pi), slope=1) + >>> circ = Circle(Point(0, 0), 5) + >>> rcirc = circ.reflect(l) + >>> rcirc + Circle(Point2D(-pi, pi), -5) + + """ + from sympy.geometry.point import Point + + g = self + l = line + o = Point(0, 0) + if l.slope.is_zero: + v = l.args[0].y + if not v: # x-axis + return g.scale(y=-1) + reps = [(p, p.translate(y=2*(v - p.y))) for p in g.atoms(Point)] + elif l.slope is oo: + v = l.args[0].x + if not v: # y-axis + return g.scale(x=-1) + reps = [(p, p.translate(x=2*(v - p.x))) for p in g.atoms(Point)] + else: + if not hasattr(g, 'reflect') and not all( + isinstance(arg, Point) for arg in g.args): + raise NotImplementedError( + 'reflect undefined or non-Point args in %s' % g) + a = atan(l.slope) + c = l.coefficients + d = -c[-1]/c[1] # y-intercept + # apply the transform to a single point + xf = Point(x, y) + xf = xf.translate(y=-d).rotate(-a, o).scale(y=-1 + ).rotate(a, o).translate(y=d) + # replace every point using that transform + reps = [(p, xf.xreplace({x: p.x, y: p.y})) for p in g.atoms(Point)] + return g.xreplace(dict(reps)) + + def rotate(self, angle, pt=None): + """Rotate ``angle`` radians counterclockwise about Point ``pt``. + + The default pt is the origin, Point(0, 0) + + See Also + ======== + + scale, translate + + Examples + ======== + + >>> from sympy import Point, RegularPolygon, Polygon, pi + >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) + >>> t # vertex on x axis + Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) + >>> t.rotate(pi/2) # vertex on y axis now + Triangle(Point2D(0, 1), Point2D(-sqrt(3)/2, -1/2), Point2D(sqrt(3)/2, -1/2)) + + """ + newargs = [] + for a in self.args: + if isinstance(a, GeometryEntity): + newargs.append(a.rotate(angle, pt)) + else: + newargs.append(a) + return type(self)(*newargs) + + def scale(self, x=1, y=1, pt=None): + """Scale the object by multiplying the x,y-coordinates by x and y. + + If pt is given, the scaling is done relative to that point; the + object is shifted by -pt, scaled, and shifted by pt. + + See Also + ======== + + rotate, translate + + Examples + ======== + + >>> from sympy import RegularPolygon, Point, Polygon + >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) + >>> t + Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) + >>> t.scale(2) + Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)/2), Point2D(-1, -sqrt(3)/2)) + >>> t.scale(2, 2) + Triangle(Point2D(2, 0), Point2D(-1, sqrt(3)), Point2D(-1, -sqrt(3))) + + """ + from sympy.geometry.point import Point + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + return type(self)(*[a.scale(x, y) for a in self.args]) # if this fails, override this class + + def translate(self, x=0, y=0): + """Shift the object by adding to the x,y-coordinates the values x and y. + + See Also + ======== + + rotate, scale + + Examples + ======== + + >>> from sympy import RegularPolygon, Point, Polygon + >>> t = Polygon(*RegularPolygon(Point(0, 0), 1, 3).vertices) + >>> t + Triangle(Point2D(1, 0), Point2D(-1/2, sqrt(3)/2), Point2D(-1/2, -sqrt(3)/2)) + >>> t.translate(2) + Triangle(Point2D(3, 0), Point2D(3/2, sqrt(3)/2), Point2D(3/2, -sqrt(3)/2)) + >>> t.translate(2, 2) + Triangle(Point2D(3, 2), Point2D(3/2, sqrt(3)/2 + 2), Point2D(3/2, 2 - sqrt(3)/2)) + + """ + newargs = [] + for a in self.args: + if isinstance(a, GeometryEntity): + newargs.append(a.translate(x, y)) + else: + newargs.append(a) + return self.func(*newargs) + + def parameter_value(self, other, t): + """Return the parameter corresponding to the given point. + Evaluating an arbitrary point of the entity at this parameter + value will return the given point. + + Examples + ======== + + >>> from sympy import Line, Point + >>> from sympy.abc import t + >>> a = Point(0, 0) + >>> b = Point(2, 2) + >>> Line(a, b).parameter_value((1, 1), t) + {t: 1/2} + >>> Line(a, b).arbitrary_point(t).subs(_) + Point2D(1, 1) + """ + from sympy.geometry.point import Point + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if not isinstance(other, Point): + raise ValueError("other must be a point") + sol = solve(self.arbitrary_point(T) - other, T, dict=True) + if not sol: + raise ValueError("Given point is not on %s" % func_name(self)) + return {t: sol[0][T]} + + +class GeometrySet(GeometryEntity, Set): + """Parent class of all GeometryEntity that are also Sets + (compatible with sympy.sets) + """ + __slots__ = () + + def _contains(self, other): + """sympy.sets uses the _contains method, so include it for compatibility.""" + + if isinstance(other, Set) and other.is_FiniteSet: + return all(self.__contains__(i) for i in other) + + return self.__contains__(other) + +@dispatch(GeometrySet, Set) # type:ignore # noqa:F811 +def union_sets(self, o): # noqa:F811 + """ Returns the union of self and o + for use with sympy.sets.Set, if possible. """ + + + # if its a FiniteSet, merge any points + # we contain and return a union with the rest + if o.is_FiniteSet: + other_points = [p for p in o if not self._contains(p)] + if len(other_points) == len(o): + return None + return Union(self, FiniteSet(*other_points)) + if self._contains(o): + return self + return None + + +@dispatch(GeometrySet, Set) # type: ignore # noqa:F811 +def intersection_sets(self, o): # noqa:F811 + """ Returns a sympy.sets.Set of intersection objects, + if possible. """ + + from sympy.geometry.point import Point + + try: + # if o is a FiniteSet, find the intersection directly + # to avoid infinite recursion + if o.is_FiniteSet: + inter = FiniteSet(*(p for p in o if self.contains(p))) + else: + inter = self.intersection(o) + except NotImplementedError: + # sympy.sets.Set.reduce expects None if an object + # doesn't know how to simplify + return None + + # put the points in a FiniteSet + points = FiniteSet(*[p for p in inter if isinstance(p, Point)]) + non_points = [p for p in inter if not isinstance(p, Point)] + + return Union(*(non_points + [points])) + +def translate(x, y): + """Return the matrix to translate a 2-D point by x and y.""" + rv = eye(3) + rv[2, 0] = x + rv[2, 1] = y + return rv + + +def scale(x, y, pt=None): + """Return the matrix to multiply a 2-D point's coordinates by x and y. + + If pt is given, the scaling is done relative to that point.""" + rv = eye(3) + rv[0, 0] = x + rv[1, 1] = y + if pt: + from sympy.geometry.point import Point + pt = Point(pt, dim=2) + tr1 = translate(*(-pt).args) + tr2 = translate(*pt.args) + return tr1*rv*tr2 + return rv + + +def rotate(th): + """Return the matrix to rotate a 2-D point about the origin by ``angle``. + + The angle is measured in radians. To Point a point about a point other + then the origin, translate the Point, do the rotation, and + translate it back: + + >>> from sympy.geometry.entity import rotate, translate + >>> from sympy import Point, pi + >>> rot_about_11 = translate(-1, -1)*rotate(pi/2)*translate(1, 1) + >>> Point(1, 1).transform(rot_about_11) + Point2D(1, 1) + >>> Point(0, 0).transform(rot_about_11) + Point2D(2, 0) + """ + s = sin(th) + rv = eye(3)*cos(th) + rv[0, 1] = s + rv[1, 0] = -s + rv[2, 2] = 1 + return rv diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/exceptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/exceptions.py new file mode 100644 index 0000000000000000000000000000000000000000..41d97af718de2cebad3accefcd60e43ccf74a3f6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/exceptions.py @@ -0,0 +1,5 @@ +"""Geometry Errors.""" + +class GeometryError(ValueError): + """An exception raised by classes in the geometry module.""" + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/line.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/line.py new file mode 100644 index 0000000000000000000000000000000000000000..ed73d43d0c9581f9d51f299cf4425acb11958e57 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/line.py @@ -0,0 +1,2877 @@ +"""Line-like geometrical entities. + +Contains +======== +LinearEntity +Line +Ray +Segment +LinearEntity2D +Line2D +Ray2D +Segment2D +LinearEntity3D +Line3D +Ray3D +Segment3D + +""" + +from sympy.core.containers import Tuple +from sympy.core.evalf import N +from sympy.core.expr import Expr +from sympy.core.numbers import Rational, oo, Float +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import _symbol, Dummy, uniquely_named_symbol +from sympy.core.sympify import sympify +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (_pi_coeff, acos, tan, atan2) +from .entity import GeometryEntity, GeometrySet +from .exceptions import GeometryError +from .point import Point, Point3D +from .util import find, intersection +from sympy.logic.boolalg import And +from sympy.matrices import Matrix +from sympy.sets.sets import Intersection +from sympy.simplify.simplify import simplify +from sympy.solvers.solvers import solve +from sympy.solvers.solveset import linear_coeffs +from sympy.utilities.misc import Undecidable, filldedent + + +import random + + +t, u = [Dummy('line_dummy') for i in range(2)] + + +class LinearEntity(GeometrySet): + """A base class for all linear entities (Line, Ray and Segment) + in n-dimensional Euclidean space. + + Attributes + ========== + + ambient_dimension + direction + length + p1 + p2 + points + + Notes + ===== + + This is an abstract class and is not meant to be instantiated. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity + + """ + def __new__(cls, p1, p2=None, **kwargs): + p1, p2 = Point._normalize_dimension(p1, p2) + if p1 == p2: + # sometimes we return a single point if we are not given two unique + # points. This is done in the specific subclass + raise ValueError( + "%s.__new__ requires two unique Points." % cls.__name__) + if len(p1) != len(p2): + raise ValueError( + "%s.__new__ requires two Points of equal dimension." % cls.__name__) + + return GeometryEntity.__new__(cls, p1, p2, **kwargs) + + def __contains__(self, other): + """Return a definitive answer or else raise an error if it cannot + be determined that other is on the boundaries of self.""" + result = self.contains(other) + + if result is not None: + return result + else: + raise Undecidable( + "Cannot decide whether '%s' contains '%s'" % (self, other)) + + def _span_test(self, other): + """Test whether the point `other` lies in the positive span of `self`. + A point x is 'in front' of a point y if x.dot(y) >= 0. Return + -1 if `other` is behind `self.p1`, 0 if `other` is `self.p1` and + and 1 if `other` is in front of `self.p1`.""" + if self.p1 == other: + return 0 + + rel_pos = other - self.p1 + d = self.direction + if d.dot(rel_pos) > 0: + return 1 + return -1 + + @property + def ambient_dimension(self): + """A property method that returns the dimension of LinearEntity + object. + + Parameters + ========== + + p1 : LinearEntity + + Returns + ======= + + dimension : integer + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(1, 1) + >>> l1 = Line(p1, p2) + >>> l1.ambient_dimension + 2 + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) + >>> l1 = Line(p1, p2) + >>> l1.ambient_dimension + 3 + + """ + return len(self.p1) + + def angle_between(l1, l2): + """Return the non-reflex angle formed by rays emanating from + the origin with directions the same as the direction vectors + of the linear entities. + + Parameters + ========== + + l1 : LinearEntity + l2 : LinearEntity + + Returns + ======= + + angle : angle in radians + + Notes + ===== + + From the dot product of vectors v1 and v2 it is known that: + + ``dot(v1, v2) = |v1|*|v2|*cos(A)`` + + where A is the angle formed between the two vectors. We can + get the directional vectors of the two lines and readily + find the angle between the two using the above formula. + + See Also + ======== + + is_perpendicular, Ray2D.closing_angle + + Examples + ======== + + >>> from sympy import Line + >>> e = Line((0, 0), (1, 0)) + >>> ne = Line((0, 0), (1, 1)) + >>> sw = Line((1, 1), (0, 0)) + >>> ne.angle_between(e) + pi/4 + >>> sw.angle_between(e) + 3*pi/4 + + To obtain the non-obtuse angle at the intersection of lines, use + the ``smallest_angle_between`` method: + + >>> sw.smallest_angle_between(e) + pi/4 + + >>> from sympy import Point3D, Line3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) + >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) + >>> l1.angle_between(l2) + acos(-sqrt(2)/3) + >>> l1.smallest_angle_between(l2) + acos(sqrt(2)/3) + """ + if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): + raise TypeError('Must pass only LinearEntity objects') + + v1, v2 = l1.direction, l2.direction + return acos(v1.dot(v2)/(abs(v1)*abs(v2))) + + def smallest_angle_between(l1, l2): + """Return the smallest angle formed at the intersection of the + lines containing the linear entities. + + Parameters + ========== + + l1 : LinearEntity + l2 : LinearEntity + + Returns + ======= + + angle : angle in radians + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 0), Point(0, 4), Point(2, -2) + >>> l1, l2 = Line(p1, p2), Line(p1, p3) + >>> l1.smallest_angle_between(l2) + pi/4 + + See Also + ======== + + angle_between, is_perpendicular, Ray2D.closing_angle + """ + if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): + raise TypeError('Must pass only LinearEntity objects') + + v1, v2 = l1.direction, l2.direction + return acos(abs(v1.dot(v2))/(abs(v1)*abs(v2))) + + def arbitrary_point(self, parameter='t'): + """A parameterized point on the Line. + + Parameters + ========== + + parameter : str, optional + The name of the parameter which will be used for the parametric + point. The default value is 't'. When this parameter is 0, the + first point used to define the line will be returned, and when + it is 1 the second point will be returned. + + Returns + ======= + + point : Point + + Raises + ====== + + ValueError + When ``parameter`` already appears in the Line's definition. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(1, 0), Point(5, 3) + >>> l1 = Line(p1, p2) + >>> l1.arbitrary_point() + Point2D(4*t + 1, 3*t) + >>> from sympy import Point3D, Line3D + >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 1) + >>> l1 = Line3D(p1, p2) + >>> l1.arbitrary_point() + Point3D(4*t + 1, 3*t, t) + + """ + t = _symbol(parameter, real=True) + if t.name in (f.name for f in self.free_symbols): + raise ValueError(filldedent(''' + Symbol %s already appears in object + and cannot be used as a parameter. + ''' % t.name)) + # multiply on the right so the variable gets + # combined with the coordinates of the point + return self.p1 + (self.p2 - self.p1)*t + + @staticmethod + def are_concurrent(*lines): + """Is a sequence of linear entities concurrent? + + Two or more linear entities are concurrent if they all + intersect at a single point. + + Parameters + ========== + + lines + A sequence of linear entities. + + Returns + ======= + + True : if the set of linear entities intersect in one point + False : otherwise. + + See Also + ======== + + sympy.geometry.util.intersection + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(3, 5) + >>> p3, p4 = Point(-2, -2), Point(0, 2) + >>> l1, l2, l3 = Line(p1, p2), Line(p1, p3), Line(p1, p4) + >>> Line.are_concurrent(l1, l2, l3) + True + >>> l4 = Line(p2, p3) + >>> Line.are_concurrent(l2, l3, l4) + False + >>> from sympy import Point3D, Line3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 5, 2) + >>> p3, p4 = Point3D(-2, -2, -2), Point3D(0, 2, 1) + >>> l1, l2, l3 = Line3D(p1, p2), Line3D(p1, p3), Line3D(p1, p4) + >>> Line3D.are_concurrent(l1, l2, l3) + True + >>> l4 = Line3D(p2, p3) + >>> Line3D.are_concurrent(l2, l3, l4) + False + + """ + common_points = Intersection(*lines) + if common_points.is_FiniteSet and len(common_points) == 1: + return True + return False + + def contains(self, other): + """Subclasses should implement this method and should return + True if other is on the boundaries of self; + False if not on the boundaries of self; + None if a determination cannot be made.""" + raise NotImplementedError() + + @property + def direction(self): + """The direction vector of the LinearEntity. + + Returns + ======= + + p : a Point; the ray from the origin to this point is the + direction of `self` + + Examples + ======== + + >>> from sympy import Line + >>> a, b = (1, 1), (1, 3) + >>> Line(a, b).direction + Point2D(0, 2) + >>> Line(b, a).direction + Point2D(0, -2) + + This can be reported so the distance from the origin is 1: + + >>> Line(b, a).direction.unit + Point2D(0, -1) + + See Also + ======== + + sympy.geometry.point.Point.unit + + """ + return self.p2 - self.p1 + + def intersection(self, other): + """The intersection with another geometrical entity. + + Parameters + ========== + + o : Point or LinearEntity + + Returns + ======= + + intersection : list of geometrical entities + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line, Segment + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(7, 7) + >>> l1 = Line(p1, p2) + >>> l1.intersection(p3) + [Point2D(7, 7)] + >>> p4, p5 = Point(5, 0), Point(0, 3) + >>> l2 = Line(p4, p5) + >>> l1.intersection(l2) + [Point2D(15/8, 15/8)] + >>> p6, p7 = Point(0, 5), Point(2, 6) + >>> s1 = Segment(p6, p7) + >>> l1.intersection(s1) + [] + >>> from sympy import Point3D, Line3D, Segment3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(7, 7, 7) + >>> l1 = Line3D(p1, p2) + >>> l1.intersection(p3) + [Point3D(7, 7, 7)] + >>> l1 = Line3D(Point3D(4,19,12), Point3D(5,25,17)) + >>> l2 = Line3D(Point3D(-3, -15, -19), direction_ratio=[2,8,8]) + >>> l1.intersection(l2) + [Point3D(1, 1, -3)] + >>> p6, p7 = Point3D(0, 5, 2), Point3D(2, 6, 3) + >>> s1 = Segment3D(p6, p7) + >>> l1.intersection(s1) + [] + + """ + def intersect_parallel_rays(ray1, ray2): + if ray1.direction.dot(ray2.direction) > 0: + # rays point in the same direction + # so return the one that is "in front" + return [ray2] if ray1._span_test(ray2.p1) >= 0 else [ray1] + else: + # rays point in opposite directions + st = ray1._span_test(ray2.p1) + if st < 0: + return [] + elif st == 0: + return [ray2.p1] + return [Segment(ray1.p1, ray2.p1)] + + def intersect_parallel_ray_and_segment(ray, seg): + st1, st2 = ray._span_test(seg.p1), ray._span_test(seg.p2) + if st1 < 0 and st2 < 0: + return [] + elif st1 >= 0 and st2 >= 0: + return [seg] + elif st1 >= 0: # st2 < 0: + return [Segment(ray.p1, seg.p1)] + else: # st1 < 0 and st2 >= 0: + return [Segment(ray.p1, seg.p2)] + + def intersect_parallel_segments(seg1, seg2): + if seg1.contains(seg2): + return [seg2] + if seg2.contains(seg1): + return [seg1] + + # direct the segments so they're oriented the same way + if seg1.direction.dot(seg2.direction) < 0: + seg2 = Segment(seg2.p2, seg2.p1) + # order the segments so seg1 is "behind" seg2 + if seg1._span_test(seg2.p1) < 0: + seg1, seg2 = seg2, seg1 + if seg2._span_test(seg1.p2) < 0: + return [] + return [Segment(seg2.p1, seg1.p2)] + + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if other.is_Point: + if self.contains(other): + return [other] + else: + return [] + elif isinstance(other, LinearEntity): + # break into cases based on whether + # the lines are parallel, non-parallel intersecting, or skew + pts = Point._normalize_dimension(self.p1, self.p2, other.p1, other.p2) + rank = Point.affine_rank(*pts) + + if rank == 1: + # we're collinear + if isinstance(self, Line): + return [other] + if isinstance(other, Line): + return [self] + + if isinstance(self, Ray) and isinstance(other, Ray): + return intersect_parallel_rays(self, other) + if isinstance(self, Ray) and isinstance(other, Segment): + return intersect_parallel_ray_and_segment(self, other) + if isinstance(self, Segment) and isinstance(other, Ray): + return intersect_parallel_ray_and_segment(other, self) + if isinstance(self, Segment) and isinstance(other, Segment): + return intersect_parallel_segments(self, other) + elif rank == 2: + # we're in the same plane + l1 = Line(*pts[:2]) + l2 = Line(*pts[2:]) + + # check to see if we're parallel. If we are, we can't + # be intersecting, since the collinear case was already + # handled + if l1.direction.is_scalar_multiple(l2.direction): + return [] + + # find the intersection as if everything were lines + # by solving the equation t*d + p1 == s*d' + p1' + m = Matrix([l1.direction, -l2.direction]).transpose() + v = Matrix([l2.p1 - l1.p1]).transpose() + + # we cannot use m.solve(v) because that only works for square matrices + m_rref, pivots = m.col_insert(2, v).rref(simplify=True) + # rank == 2 ensures we have 2 pivots, but let's check anyway + if len(pivots) != 2: + raise GeometryError("Failed when solving Mx=b when M={} and b={}".format(m, v)) + coeff = m_rref[0, 2] + line_intersection = l1.direction*coeff + self.p1 + + # if both are lines, skip a containment check + if isinstance(self, Line) and isinstance(other, Line): + return [line_intersection] + + if ((isinstance(self, Line) or + self.contains(line_intersection)) and + other.contains(line_intersection)): + return [line_intersection] + if not self.atoms(Float) and not other.atoms(Float): + # if it can fail when there are no Floats then + # maybe the following parametric check should be + # done + return [] + # floats may fail exact containment so check that the + # arbitrary points, when equal, both give a + # non-negative parameter when the arbitrary point + # coordinates are equated + tu = solve(self.arbitrary_point(t) - other.arbitrary_point(u), + t, u, dict=True)[0] + def ok(p, l): + if isinstance(l, Line): + # p > -oo + return True + if isinstance(l, Ray): + # p >= 0 + return p.is_nonnegative + if isinstance(l, Segment): + # 0 <= p <= 1 + return p.is_nonnegative and (1 - p).is_nonnegative + raise ValueError("unexpected line type") + if ok(tu[t], self) and ok(tu[u], other): + return [line_intersection] + return [] + else: + # we're skew + return [] + + return other.intersection(self) + + def is_parallel(l1, l2): + """Are two linear entities parallel? + + Parameters + ========== + + l1 : LinearEntity + l2 : LinearEntity + + Returns + ======= + + True : if l1 and l2 are parallel, + False : otherwise. + + See Also + ======== + + coefficients + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(1, 1) + >>> p3, p4 = Point(3, 4), Point(6, 7) + >>> l1, l2 = Line(p1, p2), Line(p3, p4) + >>> Line.is_parallel(l1, l2) + True + >>> p5 = Point(6, 6) + >>> l3 = Line(p3, p5) + >>> Line.is_parallel(l1, l3) + False + >>> from sympy import Point3D, Line3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(3, 4, 5) + >>> p3, p4 = Point3D(2, 1, 1), Point3D(8, 9, 11) + >>> l1, l2 = Line3D(p1, p2), Line3D(p3, p4) + >>> Line3D.is_parallel(l1, l2) + True + >>> p5 = Point3D(6, 6, 6) + >>> l3 = Line3D(p3, p5) + >>> Line3D.is_parallel(l1, l3) + False + + """ + if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): + raise TypeError('Must pass only LinearEntity objects') + + return l1.direction.is_scalar_multiple(l2.direction) + + def is_perpendicular(l1, l2): + """Are two linear entities perpendicular? + + Parameters + ========== + + l1 : LinearEntity + l2 : LinearEntity + + Returns + ======= + + True : if l1 and l2 are perpendicular, + False : otherwise. + + See Also + ======== + + coefficients + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(-1, 1) + >>> l1, l2 = Line(p1, p2), Line(p1, p3) + >>> l1.is_perpendicular(l2) + True + >>> p4 = Point(5, 3) + >>> l3 = Line(p1, p4) + >>> l1.is_perpendicular(l3) + False + >>> from sympy import Point3D, Line3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(-1, 2, 0) + >>> l1, l2 = Line3D(p1, p2), Line3D(p2, p3) + >>> l1.is_perpendicular(l2) + False + >>> p4 = Point3D(5, 3, 7) + >>> l3 = Line3D(p1, p4) + >>> l1.is_perpendicular(l3) + False + + """ + if not isinstance(l1, LinearEntity) and not isinstance(l2, LinearEntity): + raise TypeError('Must pass only LinearEntity objects') + + return S.Zero.equals(l1.direction.dot(l2.direction)) + + def is_similar(self, other): + """ + Return True if self and other are contained in the same line. + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 1), Point(3, 4), Point(2, 3) + >>> l1 = Line(p1, p2) + >>> l2 = Line(p1, p3) + >>> l1.is_similar(l2) + True + """ + l = Line(self.p1, self.p2) + return l.contains(other) + + @property + def length(self): + """ + The length of the line. + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(3, 5) + >>> l1 = Line(p1, p2) + >>> l1.length + oo + """ + return S.Infinity + + @property + def p1(self): + """The first defining point of a linear entity. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> l = Line(p1, p2) + >>> l.p1 + Point2D(0, 0) + + """ + return self.args[0] + + @property + def p2(self): + """The second defining point of a linear entity. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> l = Line(p1, p2) + >>> l.p2 + Point2D(5, 3) + + """ + return self.args[1] + + def parallel_line(self, p): + """Create a new Line parallel to this linear entity which passes + through the point `p`. + + Parameters + ========== + + p : Point + + Returns + ======= + + line : Line + + See Also + ======== + + is_parallel + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) + >>> l1 = Line(p1, p2) + >>> l2 = l1.parallel_line(p3) + >>> p3 in l2 + True + >>> l1.is_parallel(l2) + True + >>> from sympy import Point3D, Line3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) + >>> l1 = Line3D(p1, p2) + >>> l2 = l1.parallel_line(p3) + >>> p3 in l2 + True + >>> l1.is_parallel(l2) + True + + """ + p = Point(p, dim=self.ambient_dimension) + return Line(p, p + self.direction) + + def perpendicular_line(self, p): + """Create a new Line perpendicular to this linear entity which passes + through the point `p`. + + Parameters + ========== + + p : Point + + Returns + ======= + + line : Line + + See Also + ======== + + sympy.geometry.line.LinearEntity.is_perpendicular, perpendicular_segment + + Examples + ======== + + >>> from sympy import Point3D, Line3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(2, 3, 4), Point3D(-2, 2, 0) + >>> L = Line3D(p1, p2) + >>> P = L.perpendicular_line(p3); P + Line3D(Point3D(-2, 2, 0), Point3D(4/29, 6/29, 8/29)) + >>> L.is_perpendicular(P) + True + + In 3D the, the first point used to define the line is the point + through which the perpendicular was required to pass; the + second point is (arbitrarily) contained in the given line: + + >>> P.p2 in L + True + """ + p = Point(p, dim=self.ambient_dimension) + if p in self: + p = p + self.direction.orthogonal_direction + return Line(p, self.projection(p)) + + def perpendicular_segment(self, p): + """Create a perpendicular line segment from `p` to this line. + + The endpoints of the segment are ``p`` and the closest point in + the line containing self. (If self is not a line, the point might + not be in self.) + + Parameters + ========== + + p : Point + + Returns + ======= + + segment : Segment + + Notes + ===== + + Returns `p` itself if `p` is on this linear entity. + + See Also + ======== + + perpendicular_line + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, 2) + >>> l1 = Line(p1, p2) + >>> s1 = l1.perpendicular_segment(p3) + >>> l1.is_perpendicular(s1) + True + >>> p3 in s1 + True + >>> l1.perpendicular_segment(Point(4, 0)) + Segment2D(Point2D(4, 0), Point2D(2, 2)) + >>> from sympy import Point3D, Line3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, 2, 0) + >>> l1 = Line3D(p1, p2) + >>> s1 = l1.perpendicular_segment(p3) + >>> l1.is_perpendicular(s1) + True + >>> p3 in s1 + True + >>> l1.perpendicular_segment(Point3D(4, 0, 0)) + Segment3D(Point3D(4, 0, 0), Point3D(4/3, 4/3, 4/3)) + + """ + p = Point(p, dim=self.ambient_dimension) + if p in self: + return p + l = self.perpendicular_line(p) + # The intersection should be unique, so unpack the singleton + p2, = Intersection(Line(self.p1, self.p2), l) + + return Segment(p, p2) + + @property + def points(self): + """The two points used to define this linear entity. + + Returns + ======= + + points : tuple of Points + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(5, 11) + >>> l1 = Line(p1, p2) + >>> l1.points + (Point2D(0, 0), Point2D(5, 11)) + + """ + return (self.p1, self.p2) + + def projection(self, other): + """Project a point, line, ray, or segment onto this linear entity. + + Parameters + ========== + + other : Point or LinearEntity (Line, Ray, Segment) + + Returns + ======= + + projection : Point or LinearEntity (Line, Ray, Segment) + The return type matches the type of the parameter ``other``. + + Raises + ====== + + GeometryError + When method is unable to perform projection. + + Notes + ===== + + A projection involves taking the two points that define + the linear entity and projecting those points onto a + Line and then reforming the linear entity using these + projections. + A point P is projected onto a line L by finding the point + on L that is closest to P. This point is the intersection + of L and the line perpendicular to L that passes through P. + + See Also + ======== + + sympy.geometry.point.Point, perpendicular_line + + Examples + ======== + + >>> from sympy import Point, Line, Segment, Rational + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(Rational(1, 2), 0) + >>> l1 = Line(p1, p2) + >>> l1.projection(p3) + Point2D(1/4, 1/4) + >>> p4, p5 = Point(10, 0), Point(12, 1) + >>> s1 = Segment(p4, p5) + >>> l1.projection(s1) + Segment2D(Point2D(5, 5), Point2D(13/2, 13/2)) + >>> p1, p2, p3 = Point(0, 0, 1), Point(1, 1, 2), Point(2, 0, 1) + >>> l1 = Line(p1, p2) + >>> l1.projection(p3) + Point3D(2/3, 2/3, 5/3) + >>> p4, p5 = Point(10, 0, 1), Point(12, 1, 3) + >>> s1 = Segment(p4, p5) + >>> l1.projection(s1) + Segment3D(Point3D(10/3, 10/3, 13/3), Point3D(5, 5, 6)) + + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + + def proj_point(p): + return Point.project(p - self.p1, self.direction) + self.p1 + + if isinstance(other, Point): + return proj_point(other) + elif isinstance(other, LinearEntity): + p1, p2 = proj_point(other.p1), proj_point(other.p2) + # test to see if we're degenerate + if p1 == p2: + return p1 + projected = other.__class__(p1, p2) + projected = Intersection(self, projected) + if projected.is_empty: + return projected + # if we happen to have intersected in only a point, return that + if projected.is_FiniteSet and len(projected) == 1: + # projected is a set of size 1, so unpack it in `a` + a, = projected + return a + # order args so projection is in the same direction as self + if self.direction.dot(projected.direction) < 0: + p1, p2 = projected.args + projected = projected.func(p2, p1) + return projected + + raise GeometryError( + "Do not know how to project %s onto %s" % (other, self)) + + def random_point(self, seed=None): + """A random point on a LinearEntity. + + Returns + ======= + + point : Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Line, Ray, Segment + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> line = Line(p1, p2) + >>> r = line.random_point(seed=42) # seed value is optional + >>> r.n(3) + Point2D(-0.72, -0.432) + >>> r in line + True + >>> Ray(p1, p2).random_point(seed=42).n(3) + Point2D(0.72, 0.432) + >>> Segment(p1, p2).random_point(seed=42).n(3) + Point2D(3.2, 1.92) + + """ + if seed is not None: + rng = random.Random(seed) + else: + rng = random + pt = self.arbitrary_point(t) + if isinstance(self, Ray): + v = abs(rng.gauss(0, 1)) + elif isinstance(self, Segment): + v = rng.random() + elif isinstance(self, Line): + v = rng.gauss(0, 1) + else: + raise NotImplementedError('unhandled line type') + return pt.subs(t, Rational(v)) + + def bisectors(self, other): + """Returns the perpendicular lines which pass through the intersections + of self and other that are in the same plane. + + Parameters + ========== + + line : Line3D + + Returns + ======= + + list: two Line instances + + Examples + ======== + + >>> from sympy import Point3D, Line3D + >>> r1 = Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)) + >>> r2 = Line3D(Point3D(0, 0, 0), Point3D(0, 1, 0)) + >>> r1.bisectors(r2) + [Line3D(Point3D(0, 0, 0), Point3D(1, 1, 0)), Line3D(Point3D(0, 0, 0), Point3D(1, -1, 0))] + + """ + if not isinstance(other, LinearEntity): + raise GeometryError("Expecting LinearEntity, not %s" % other) + + l1, l2 = self, other + + # make sure dimensions match or else a warning will rise from + # intersection calculation + if l1.p1.ambient_dimension != l2.p1.ambient_dimension: + if isinstance(l1, Line2D): + l1, l2 = l2, l1 + _, p1 = Point._normalize_dimension(l1.p1, l2.p1, on_morph='ignore') + _, p2 = Point._normalize_dimension(l1.p2, l2.p2, on_morph='ignore') + l2 = Line(p1, p2) + + point = intersection(l1, l2) + + # Three cases: Lines may intersect in a point, may be equal or may not intersect. + if not point: + raise GeometryError("The lines do not intersect") + else: + pt = point[0] + if isinstance(pt, Line): + # Intersection is a line because both lines are coincident + return [self] + + + d1 = l1.direction.unit + d2 = l2.direction.unit + + bis1 = Line(pt, pt + d1 + d2) + bis2 = Line(pt, pt + d1 - d2) + + return [bis1, bis2] + + +class Line(LinearEntity): + """An infinite line in space. + + A 2D line is declared with two distinct points, point and slope, or + an equation. A 3D line may be defined with a point and a direction ratio. + + Parameters + ========== + + p1 : Point + p2 : Point + slope : SymPy expression + direction_ratio : list + equation : equation of a line + + Notes + ===== + + `Line` will automatically subclass to `Line2D` or `Line3D` based + on the dimension of `p1`. The `slope` argument is only relevant + for `Line2D` and the `direction_ratio` argument is only relevant + for `Line3D`. + + The order of the points will define the direction of the line + which is used when calculating the angle between lines. + + See Also + ======== + + sympy.geometry.point.Point + sympy.geometry.line.Line2D + sympy.geometry.line.Line3D + + Examples + ======== + + >>> from sympy import Line, Segment, Point, Eq + >>> from sympy.abc import x, y, a, b + + >>> L = Line(Point(2,3), Point(3,5)) + >>> L + Line2D(Point2D(2, 3), Point2D(3, 5)) + >>> L.points + (Point2D(2, 3), Point2D(3, 5)) + >>> L.equation() + -2*x + y + 1 + >>> L.coefficients + (-2, 1, 1) + + Instantiate with keyword ``slope``: + + >>> Line(Point(0, 0), slope=0) + Line2D(Point2D(0, 0), Point2D(1, 0)) + + Instantiate with another linear object + + >>> s = Segment((0, 0), (0, 1)) + >>> Line(s).equation() + x + + The line corresponding to an equation in the for `ax + by + c = 0`, + can be entered: + + >>> Line(3*x + y + 18) + Line2D(Point2D(0, -18), Point2D(1, -21)) + + If `x` or `y` has a different name, then they can be specified, too, + as a string (to match the name) or symbol: + + >>> Line(Eq(3*a + b, -18), x='a', y=b) + Line2D(Point2D(0, -18), Point2D(1, -21)) + """ + def __new__(cls, *args, **kwargs): + if len(args) == 1 and isinstance(args[0], (Expr, Eq)): + missing = uniquely_named_symbol('?', args) + if not kwargs: + x = 'x' + y = 'y' + else: + x = kwargs.pop('x', missing) + y = kwargs.pop('y', missing) + if kwargs: + raise ValueError('expecting only x and y as keywords') + + equation = args[0] + if isinstance(equation, Eq): + equation = equation.lhs - equation.rhs + + def find_or_missing(x): + try: + return find(x, equation) + except ValueError: + return missing + x = find_or_missing(x) + y = find_or_missing(y) + + a, b, c = linear_coeffs(equation, x, y) + + if b: + return Line((0, -c/b), slope=-a/b) + if a: + return Line((-c/a, 0), slope=oo) + + raise ValueError('not found in equation: %s' % (set('xy') - {x, y})) + + else: + if len(args) > 0: + p1 = args[0] + if len(args) > 1: + p2 = args[1] + else: + p2 = None + + if isinstance(p1, LinearEntity): + if p2: + raise ValueError('If p1 is a LinearEntity, p2 must be None.') + dim = len(p1.p1) + else: + p1 = Point(p1) + dim = len(p1) + if p2 is not None or isinstance(p2, Point) and p2.ambient_dimension != dim: + p2 = Point(p2) + + if dim == 2: + return Line2D(p1, p2, **kwargs) + elif dim == 3: + return Line3D(p1, p2, **kwargs) + return LinearEntity.__new__(cls, p1, p2, **kwargs) + + def contains(self, other): + """ + Return True if `other` is on this Line, or False otherwise. + + Examples + ======== + + >>> from sympy import Line,Point + >>> p1, p2 = Point(0, 1), Point(3, 4) + >>> l = Line(p1, p2) + >>> l.contains(p1) + True + >>> l.contains((0, 1)) + True + >>> l.contains((0, 0)) + False + >>> a = (0, 0, 0) + >>> b = (1, 1, 1) + >>> c = (2, 2, 2) + >>> l1 = Line(a, b) + >>> l2 = Line(b, a) + >>> l1 == l2 + False + >>> l1 in l2 + True + + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if isinstance(other, Point): + return Point.is_collinear(other, self.p1, self.p2) + if isinstance(other, LinearEntity): + return Point.is_collinear(self.p1, self.p2, other.p1, other.p2) + return False + + def distance(self, other): + """ + Finds the shortest distance between a line and a point. + + Raises + ====== + + NotImplementedError is raised if `other` is not a Point + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(1, 1) + >>> s = Line(p1, p2) + >>> s.distance(Point(-1, 1)) + sqrt(2) + >>> s.distance((-1, 2)) + 3*sqrt(2)/2 + >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 1) + >>> s = Line(p1, p2) + >>> s.distance(Point(-1, 1, 1)) + 2*sqrt(6)/3 + >>> s.distance((-1, 1, 1)) + 2*sqrt(6)/3 + + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if self.contains(other): + return S.Zero + return self.perpendicular_segment(other).length + + def equals(self, other): + """Returns True if self and other are the same mathematical entities""" + if not isinstance(other, Line): + return False + return Point.is_collinear(self.p1, other.p1, self.p2, other.p2) + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of line. Gives + values that will produce a line that is +/- 5 units long (where a + unit is the distance between the two points that define the line). + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + plot_interval : list (plot interval) + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> l1 = Line(p1, p2) + >>> l1.plot_interval() + [t, -5, 5] + + """ + t = _symbol(parameter, real=True) + return [t, -5, 5] + + +class Ray(LinearEntity): + """A Ray is a semi-line in the space with a source point and a direction. + + Parameters + ========== + + p1 : Point + The source of the Ray + p2 : Point or radian value + This point determines the direction in which the Ray propagates. + If given as an angle it is interpreted in radians with the positive + direction being ccw. + + Attributes + ========== + + source + + See Also + ======== + + sympy.geometry.line.Ray2D + sympy.geometry.line.Ray3D + sympy.geometry.point.Point + sympy.geometry.line.Line + + Notes + ===== + + `Ray` will automatically subclass to `Ray2D` or `Ray3D` based on the + dimension of `p1`. + + Examples + ======== + + >>> from sympy import Ray, Point, pi + >>> r = Ray(Point(2, 3), Point(3, 5)) + >>> r + Ray2D(Point2D(2, 3), Point2D(3, 5)) + >>> r.points + (Point2D(2, 3), Point2D(3, 5)) + >>> r.source + Point2D(2, 3) + >>> r.xdirection + oo + >>> r.ydirection + oo + >>> r.slope + 2 + >>> Ray(Point(0, 0), angle=pi/4).slope + 1 + + """ + def __new__(cls, p1, p2=None, **kwargs): + p1 = Point(p1) + if p2 is not None: + p1, p2 = Point._normalize_dimension(p1, Point(p2)) + dim = len(p1) + + if dim == 2: + return Ray2D(p1, p2, **kwargs) + elif dim == 3: + return Ray3D(p1, p2, **kwargs) + return LinearEntity.__new__(cls, p1, p2, **kwargs) + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG path element for the LinearEntity. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + verts = (N(self.p1), N(self.p2)) + coords = ["{},{}".format(p.x, p.y) for p in verts] + path = "M {} L {}".format(coords[0], " L ".join(coords[1:])) + + return ( + '' + ).format(2.*scale_factor, path, fill_color) + + def contains(self, other): + """ + Is other GeometryEntity contained in this Ray? + + Examples + ======== + + >>> from sympy import Ray,Point,Segment + >>> p1, p2 = Point(0, 0), Point(4, 4) + >>> r = Ray(p1, p2) + >>> r.contains(p1) + True + >>> r.contains((1, 1)) + True + >>> r.contains((1, 3)) + False + >>> s = Segment((1, 1), (2, 2)) + >>> r.contains(s) + True + >>> s = Segment((1, 2), (2, 5)) + >>> r.contains(s) + False + >>> r1 = Ray((2, 2), (3, 3)) + >>> r.contains(r1) + True + >>> r1 = Ray((2, 2), (3, 5)) + >>> r.contains(r1) + False + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if isinstance(other, Point): + if Point.is_collinear(self.p1, self.p2, other): + # if we're in the direction of the ray, our + # direction vector dot the ray's direction vector + # should be non-negative + return bool((self.p2 - self.p1).dot(other - self.p1) >= S.Zero) + return False + elif isinstance(other, Ray): + if Point.is_collinear(self.p1, self.p2, other.p1, other.p2): + return bool((self.p2 - self.p1).dot(other.p2 - other.p1) > S.Zero) + return False + elif isinstance(other, Segment): + return other.p1 in self and other.p2 in self + + # No other known entity can be contained in a Ray + return False + + def distance(self, other): + """ + Finds the shortest distance between the ray and a point. + + Raises + ====== + + NotImplementedError is raised if `other` is not a Point + + Examples + ======== + + >>> from sympy import Point, Ray + >>> p1, p2 = Point(0, 0), Point(1, 1) + >>> s = Ray(p1, p2) + >>> s.distance(Point(-1, -1)) + sqrt(2) + >>> s.distance((-1, 2)) + 3*sqrt(2)/2 + >>> p1, p2 = Point(0, 0, 0), Point(1, 1, 2) + >>> s = Ray(p1, p2) + >>> s + Ray3D(Point3D(0, 0, 0), Point3D(1, 1, 2)) + >>> s.distance(Point(-1, -1, 2)) + 4*sqrt(3)/3 + >>> s.distance((-1, -1, 2)) + 4*sqrt(3)/3 + + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if self.contains(other): + return S.Zero + + proj = Line(self.p1, self.p2).projection(other) + if self.contains(proj): + return abs(other - proj) + else: + return abs(other - self.source) + + def equals(self, other): + """Returns True if self and other are the same mathematical entities""" + if not isinstance(other, Ray): + return False + return self.source == other.source and other.p2 in self + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of the Ray. Gives + values that will produce a ray that is 10 units long (where a unit is + the distance between the two points that define the ray). + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + plot_interval : list + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Ray, pi + >>> r = Ray((0, 0), angle=pi/4) + >>> r.plot_interval() + [t, 0, 10] + + """ + t = _symbol(parameter, real=True) + return [t, 0, 10] + + @property + def source(self): + """The point from which the ray emanates. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Ray + >>> p1, p2 = Point(0, 0), Point(4, 1) + >>> r1 = Ray(p1, p2) + >>> r1.source + Point2D(0, 0) + >>> p1, p2 = Point(0, 0, 0), Point(4, 1, 5) + >>> r1 = Ray(p2, p1) + >>> r1.source + Point3D(4, 1, 5) + + """ + return self.p1 + + +class Segment(LinearEntity): + """A line segment in space. + + Parameters + ========== + + p1 : Point + p2 : Point + + Attributes + ========== + + length : number or SymPy expression + midpoint : Point + + See Also + ======== + + sympy.geometry.line.Segment2D + sympy.geometry.line.Segment3D + sympy.geometry.point.Point + sympy.geometry.line.Line + + Notes + ===== + + If 2D or 3D points are used to define `Segment`, it will + be automatically subclassed to `Segment2D` or `Segment3D`. + + Examples + ======== + + >>> from sympy import Point, Segment + >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts + Segment2D(Point2D(1, 0), Point2D(1, 1)) + >>> s = Segment(Point(4, 3), Point(1, 1)) + >>> s.points + (Point2D(4, 3), Point2D(1, 1)) + >>> s.slope + 2/3 + >>> s.length + sqrt(13) + >>> s.midpoint + Point2D(5/2, 2) + >>> Segment((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts + Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) + >>> s = Segment(Point(4, 3, 9), Point(1, 1, 7)); s + Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) + >>> s.points + (Point3D(4, 3, 9), Point3D(1, 1, 7)) + >>> s.length + sqrt(17) + >>> s.midpoint + Point3D(5/2, 2, 8) + + """ + def __new__(cls, p1, p2, **kwargs): + p1, p2 = Point._normalize_dimension(Point(p1), Point(p2)) + dim = len(p1) + + if dim == 2: + return Segment2D(p1, p2, **kwargs) + elif dim == 3: + return Segment3D(p1, p2, **kwargs) + return LinearEntity.__new__(cls, p1, p2, **kwargs) + + def contains(self, other): + """ + Is the other GeometryEntity contained within this Segment? + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2 = Point(0, 1), Point(3, 4) + >>> s = Segment(p1, p2) + >>> s2 = Segment(p2, p1) + >>> s.contains(s2) + True + >>> from sympy import Point3D, Segment3D + >>> p1, p2 = Point3D(0, 1, 1), Point3D(3, 4, 5) + >>> s = Segment3D(p1, p2) + >>> s2 = Segment3D(p2, p1) + >>> s.contains(s2) + True + >>> s.contains((p1 + p2)/2) + True + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if isinstance(other, Point): + if Point.is_collinear(other, self.p1, self.p2): + if isinstance(self, Segment2D): + # if it is collinear and is in the bounding box of the + # segment then it must be on the segment + vert = (1/self.slope).equals(0) + if vert is False: + isin = (self.p1.x - other.x)*(self.p2.x - other.x) <= 0 + if isin in (True, False): + return isin + if vert is True: + isin = (self.p1.y - other.y)*(self.p2.y - other.y) <= 0 + if isin in (True, False): + return isin + # use the triangle inequality + d1, d2 = other - self.p1, other - self.p2 + d = self.p2 - self.p1 + # without the call to simplify, SymPy cannot tell that an expression + # like (a+b)*(a/2+b/2) is always non-negative. If it cannot be + # determined, raise an Undecidable error + try: + # the triangle inequality says that |d1|+|d2| >= |d| and is strict + # only if other lies in the line segment + return bool(simplify(Eq(abs(d1) + abs(d2) - abs(d), 0))) + except TypeError: + raise Undecidable("Cannot determine if {} is in {}".format(other, self)) + if isinstance(other, Segment): + return other.p1 in self and other.p2 in self + + return False + + def equals(self, other): + """Returns True if self and other are the same mathematical entities""" + return isinstance(other, self.func) and list( + ordered(self.args)) == list(ordered(other.args)) + + def distance(self, other): + """ + Finds the shortest distance between a line segment and a point. + + Raises + ====== + + NotImplementedError is raised if `other` is not a Point + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2 = Point(0, 1), Point(3, 4) + >>> s = Segment(p1, p2) + >>> s.distance(Point(10, 15)) + sqrt(170) + >>> s.distance((0, 12)) + sqrt(73) + >>> from sympy import Point3D, Segment3D + >>> p1, p2 = Point3D(0, 0, 3), Point3D(1, 1, 4) + >>> s = Segment3D(p1, p2) + >>> s.distance(Point3D(10, 15, 12)) + sqrt(341) + >>> s.distance((10, 15, 12)) + sqrt(341) + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if isinstance(other, Point): + vp1 = other - self.p1 + vp2 = other - self.p2 + + dot_prod_sign_1 = self.direction.dot(vp1) >= 0 + dot_prod_sign_2 = self.direction.dot(vp2) <= 0 + if dot_prod_sign_1 and dot_prod_sign_2: + return Line(self.p1, self.p2).distance(other) + if dot_prod_sign_1 and not dot_prod_sign_2: + return abs(vp2) + if not dot_prod_sign_1 and dot_prod_sign_2: + return abs(vp1) + raise NotImplementedError() + + @property + def length(self): + """The length of the line segment. + + See Also + ======== + + sympy.geometry.point.Point.distance + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2 = Point(0, 0), Point(4, 3) + >>> s1 = Segment(p1, p2) + >>> s1.length + 5 + >>> from sympy import Point3D, Segment3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) + >>> s1 = Segment3D(p1, p2) + >>> s1.length + sqrt(34) + + """ + return Point.distance(self.p1, self.p2) + + @property + def midpoint(self): + """The midpoint of the line segment. + + See Also + ======== + + sympy.geometry.point.Point.midpoint + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2 = Point(0, 0), Point(4, 3) + >>> s1 = Segment(p1, p2) + >>> s1.midpoint + Point2D(2, 3/2) + >>> from sympy import Point3D, Segment3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(4, 3, 3) + >>> s1 = Segment3D(p1, p2) + >>> s1.midpoint + Point3D(2, 3/2, 3/2) + + """ + return Point.midpoint(self.p1, self.p2) + + def perpendicular_bisector(self, p=None): + """The perpendicular bisector of this segment. + + If no point is specified or the point specified is not on the + bisector then the bisector is returned as a Line. Otherwise a + Segment is returned that joins the point specified and the + intersection of the bisector and the segment. + + Parameters + ========== + + p : Point + + Returns + ======= + + bisector : Line or Segment + + See Also + ======== + + LinearEntity.perpendicular_segment + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2, p3 = Point(0, 0), Point(6, 6), Point(5, 1) + >>> s1 = Segment(p1, p2) + >>> s1.perpendicular_bisector() + Line2D(Point2D(3, 3), Point2D(-3, 9)) + + >>> s1.perpendicular_bisector(p3) + Segment2D(Point2D(5, 1), Point2D(3, 3)) + + """ + l = self.perpendicular_line(self.midpoint) + if p is not None: + p2 = Point(p, dim=self.ambient_dimension) + if p2 in l: + return Segment(p2, self.midpoint) + return l + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of the Segment gives + values that will produce the full segment in a plot. + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + plot_interval : list + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Point, Segment + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> s1 = Segment(p1, p2) + >>> s1.plot_interval() + [t, 0, 1] + + """ + t = _symbol(parameter, real=True) + return [t, 0, 1] + + +class LinearEntity2D(LinearEntity): + """A base class for all linear entities (line, ray and segment) + in a 2-dimensional Euclidean space. + + Attributes + ========== + + p1 + p2 + coefficients + slope + points + + Notes + ===== + + This is an abstract class and is not meant to be instantiated. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity + + """ + @property + def bounds(self): + """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding + rectangle for the geometric figure. + + """ + verts = self.points + xs = [p.x for p in verts] + ys = [p.y for p in verts] + return (min(xs), min(ys), max(xs), max(ys)) + + def perpendicular_line(self, p): + """Create a new Line perpendicular to this linear entity which passes + through the point `p`. + + Parameters + ========== + + p : Point + + Returns + ======= + + line : Line + + See Also + ======== + + sympy.geometry.line.LinearEntity.is_perpendicular, perpendicular_segment + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) + >>> L = Line(p1, p2) + >>> P = L.perpendicular_line(p3); P + Line2D(Point2D(-2, 2), Point2D(-5, 4)) + >>> L.is_perpendicular(P) + True + + In 2D, the first point of the perpendicular line is the + point through which was required to pass; the second + point is arbitrarily chosen. To get a line that explicitly + uses a point in the line, create a line from the perpendicular + segment from the line to the point: + + >>> Line(L.perpendicular_segment(p3)) + Line2D(Point2D(-2, 2), Point2D(4/13, 6/13)) + """ + p = Point(p, dim=self.ambient_dimension) + # any two lines in R^2 intersect, so blindly making + # a line through p in an orthogonal direction will work + # and is faster than finding the projection point as in 3D + return Line(p, p + self.direction.orthogonal_direction) + + @property + def slope(self): + """The slope of this linear entity, or infinity if vertical. + + Returns + ======= + + slope : number or SymPy expression + + See Also + ======== + + coefficients + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(0, 0), Point(3, 5) + >>> l1 = Line(p1, p2) + >>> l1.slope + 5/3 + + >>> p3 = Point(0, 4) + >>> l2 = Line(p1, p3) + >>> l2.slope + oo + + """ + d1, d2 = (self.p1 - self.p2).args + if d1 == 0: + return S.Infinity + return simplify(d2/d1) + + +class Line2D(LinearEntity2D, Line): + """An infinite line in space 2D. + + A line is declared with two distinct points or a point and slope + as defined using keyword `slope`. + + Parameters + ========== + + p1 : Point + pt : Point + slope : SymPy expression + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Line, Segment, Point + >>> L = Line(Point(2,3), Point(3,5)) + >>> L + Line2D(Point2D(2, 3), Point2D(3, 5)) + >>> L.points + (Point2D(2, 3), Point2D(3, 5)) + >>> L.equation() + -2*x + y + 1 + >>> L.coefficients + (-2, 1, 1) + + Instantiate with keyword ``slope``: + + >>> Line(Point(0, 0), slope=0) + Line2D(Point2D(0, 0), Point2D(1, 0)) + + Instantiate with another linear object + + >>> s = Segment((0, 0), (0, 1)) + >>> Line(s).equation() + x + """ + def __new__(cls, p1, pt=None, slope=None, **kwargs): + if isinstance(p1, LinearEntity): + if pt is not None: + raise ValueError('When p1 is a LinearEntity, pt should be None') + p1, pt = Point._normalize_dimension(*p1.args, dim=2) + else: + p1 = Point(p1, dim=2) + if pt is not None and slope is None: + try: + p2 = Point(pt, dim=2) + except (NotImplementedError, TypeError, ValueError): + raise ValueError(filldedent(''' + The 2nd argument was not a valid Point. + If it was a slope, enter it with keyword "slope". + ''')) + elif slope is not None and pt is None: + slope = sympify(slope) + if slope.is_finite is False: + # when infinite slope, don't change x + dx = 0 + dy = 1 + else: + # go over 1 up slope + dx = 1 + dy = slope + # XXX avoiding simplification by adding to coords directly + p2 = Point(p1.x + dx, p1.y + dy, evaluate=False) + else: + raise ValueError('A 2nd Point or keyword "slope" must be used.') + return LinearEntity2D.__new__(cls, p1, p2, **kwargs) + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG path element for the LinearEntity. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + verts = (N(self.p1), N(self.p2)) + coords = ["{},{}".format(p.x, p.y) for p in verts] + path = "M {} L {}".format(coords[0], " L ".join(coords[1:])) + + return ( + '' + ).format(2.*scale_factor, path, fill_color) + + @property + def coefficients(self): + """The coefficients (`a`, `b`, `c`) for `ax + by + c = 0`. + + See Also + ======== + + sympy.geometry.line.Line2D.equation + + Examples + ======== + + >>> from sympy import Point, Line + >>> from sympy.abc import x, y + >>> p1, p2 = Point(0, 0), Point(5, 3) + >>> l = Line(p1, p2) + >>> l.coefficients + (-3, 5, 0) + + >>> p3 = Point(x, y) + >>> l2 = Line(p1, p3) + >>> l2.coefficients + (-y, x, 0) + + """ + p1, p2 = self.points + if p1.x == p2.x: + return (S.One, S.Zero, -p1.x) + elif p1.y == p2.y: + return (S.Zero, S.One, -p1.y) + return tuple([simplify(i) for i in + (self.p1.y - self.p2.y, + self.p2.x - self.p1.x, + self.p1.x*self.p2.y - self.p1.y*self.p2.x)]) + + def equation(self, x='x', y='y'): + """The equation of the line: ax + by + c. + + Parameters + ========== + + x : str, optional + The name to use for the x-axis, default value is 'x'. + y : str, optional + The name to use for the y-axis, default value is 'y'. + + Returns + ======= + + equation : SymPy expression + + See Also + ======== + + sympy.geometry.line.Line2D.coefficients + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(1, 0), Point(5, 3) + >>> l1 = Line(p1, p2) + >>> l1.equation() + -3*x + 4*y + 3 + + """ + x = _symbol(x, real=True) + y = _symbol(y, real=True) + p1, p2 = self.points + if p1.x == p2.x: + return x - p1.x + elif p1.y == p2.y: + return y - p1.y + + a, b, c = self.coefficients + return a*x + b*y + c + + +class Ray2D(LinearEntity2D, Ray): + """ + A Ray is a semi-line in the space with a source point and a direction. + + Parameters + ========== + + p1 : Point + The source of the Ray + p2 : Point or radian value + This point determines the direction in which the Ray propagates. + If given as an angle it is interpreted in radians with the positive + direction being ccw. + + Attributes + ========== + + source + xdirection + ydirection + + See Also + ======== + + sympy.geometry.point.Point, Line + + Examples + ======== + + >>> from sympy import Point, pi, Ray + >>> r = Ray(Point(2, 3), Point(3, 5)) + >>> r + Ray2D(Point2D(2, 3), Point2D(3, 5)) + >>> r.points + (Point2D(2, 3), Point2D(3, 5)) + >>> r.source + Point2D(2, 3) + >>> r.xdirection + oo + >>> r.ydirection + oo + >>> r.slope + 2 + >>> Ray(Point(0, 0), angle=pi/4).slope + 1 + + """ + def __new__(cls, p1, pt=None, angle=None, **kwargs): + p1 = Point(p1, dim=2) + if pt is not None and angle is None: + try: + p2 = Point(pt, dim=2) + except (NotImplementedError, TypeError, ValueError): + raise ValueError(filldedent(''' + The 2nd argument was not a valid Point; if + it was meant to be an angle it should be + given with keyword "angle".''')) + if p1 == p2: + raise ValueError('A Ray requires two distinct points.') + elif angle is not None and pt is None: + # we need to know if the angle is an odd multiple of pi/2 + angle = sympify(angle) + c = _pi_coeff(angle) + p2 = None + if c is not None: + if c.is_Rational: + if c.q == 2: + if c.p == 1: + p2 = p1 + Point(0, 1) + elif c.p == 3: + p2 = p1 + Point(0, -1) + elif c.q == 1: + if c.p == 0: + p2 = p1 + Point(1, 0) + elif c.p == 1: + p2 = p1 + Point(-1, 0) + if p2 is None: + c *= S.Pi + else: + c = angle % (2*S.Pi) + if not p2: + m = 2*c/S.Pi + left = And(1 < m, m < 3) # is it in quadrant 2 or 3? + x = Piecewise((-1, left), (Piecewise((0, Eq(m % 1, 0)), (1, True)), True)) + y = Piecewise((-tan(c), left), (Piecewise((1, Eq(m, 1)), (-1, Eq(m, 3)), (tan(c), True)), True)) + p2 = p1 + Point(x, y) + else: + raise ValueError('A 2nd point or keyword "angle" must be used.') + + return LinearEntity2D.__new__(cls, p1, p2, **kwargs) + + @property + def xdirection(self): + """The x direction of the ray. + + Positive infinity if the ray points in the positive x direction, + negative infinity if the ray points in the negative x direction, + or 0 if the ray is vertical. + + See Also + ======== + + ydirection + + Examples + ======== + + >>> from sympy import Point, Ray + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, -1) + >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) + >>> r1.xdirection + oo + >>> r2.xdirection + 0 + + """ + if self.p1.x < self.p2.x: + return S.Infinity + elif self.p1.x == self.p2.x: + return S.Zero + else: + return S.NegativeInfinity + + @property + def ydirection(self): + """The y direction of the ray. + + Positive infinity if the ray points in the positive y direction, + negative infinity if the ray points in the negative y direction, + or 0 if the ray is horizontal. + + See Also + ======== + + xdirection + + Examples + ======== + + >>> from sympy import Point, Ray + >>> p1, p2, p3 = Point(0, 0), Point(-1, -1), Point(-1, 0) + >>> r1, r2 = Ray(p1, p2), Ray(p1, p3) + >>> r1.ydirection + -oo + >>> r2.ydirection + 0 + + """ + if self.p1.y < self.p2.y: + return S.Infinity + elif self.p1.y == self.p2.y: + return S.Zero + else: + return S.NegativeInfinity + + def closing_angle(r1, r2): + """Return the angle by which r2 must be rotated so it faces the same + direction as r1. + + Parameters + ========== + + r1 : Ray2D + r2 : Ray2D + + Returns + ======= + + angle : angle in radians (ccw angle is positive) + + See Also + ======== + + LinearEntity.angle_between + + Examples + ======== + + >>> from sympy import Ray, pi + >>> r1 = Ray((0, 0), (1, 0)) + >>> r2 = r1.rotate(-pi/2) + >>> angle = r1.closing_angle(r2); angle + pi/2 + >>> r2.rotate(angle).direction.unit == r1.direction.unit + True + >>> r2.closing_angle(r1) + -pi/2 + """ + if not all(isinstance(r, Ray2D) for r in (r1, r2)): + # although the direction property is defined for + # all linear entities, only the Ray is truly a + # directed object + raise TypeError('Both arguments must be Ray2D objects.') + + a1 = atan2(*list(reversed(r1.direction.args))) + a2 = atan2(*list(reversed(r2.direction.args))) + if a1*a2 < 0: + a1 = 2*S.Pi + a1 if a1 < 0 else a1 + a2 = 2*S.Pi + a2 if a2 < 0 else a2 + return a1 - a2 + + +class Segment2D(LinearEntity2D, Segment): + """A line segment in 2D space. + + Parameters + ========== + + p1 : Point + p2 : Point + + Attributes + ========== + + length : number or SymPy expression + midpoint : Point + + See Also + ======== + + sympy.geometry.point.Point, Line + + Examples + ======== + + >>> from sympy import Point, Segment + >>> Segment((1, 0), (1, 1)) # tuples are interpreted as pts + Segment2D(Point2D(1, 0), Point2D(1, 1)) + >>> s = Segment(Point(4, 3), Point(1, 1)); s + Segment2D(Point2D(4, 3), Point2D(1, 1)) + >>> s.points + (Point2D(4, 3), Point2D(1, 1)) + >>> s.slope + 2/3 + >>> s.length + sqrt(13) + >>> s.midpoint + Point2D(5/2, 2) + + """ + def __new__(cls, p1, p2, **kwargs): + p1 = Point(p1, dim=2) + p2 = Point(p2, dim=2) + + if p1 == p2: + return p1 + + return LinearEntity2D.__new__(cls, p1, p2, **kwargs) + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG path element for the LinearEntity. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + verts = (N(self.p1), N(self.p2)) + coords = ["{},{}".format(p.x, p.y) for p in verts] + path = "M {} L {}".format(coords[0], " L ".join(coords[1:])) + return ( + '' + ).format(2.*scale_factor, path, fill_color) + + +class LinearEntity3D(LinearEntity): + """An base class for all linear entities (line, ray and segment) + in a 3-dimensional Euclidean space. + + Attributes + ========== + + p1 + p2 + direction_ratio + direction_cosine + points + + Notes + ===== + + This is a base class and is not meant to be instantiated. + """ + def __new__(cls, p1, p2, **kwargs): + p1 = Point3D(p1, dim=3) + p2 = Point3D(p2, dim=3) + if p1 == p2: + # if it makes sense to return a Point, handle in subclass + raise ValueError( + "%s.__new__ requires two unique Points." % cls.__name__) + + return GeometryEntity.__new__(cls, p1, p2, **kwargs) + + ambient_dimension = 3 + + @property + def direction_ratio(self): + """The direction ratio of a given line in 3D. + + See Also + ======== + + sympy.geometry.line.Line3D.equation + + Examples + ======== + + >>> from sympy import Point3D, Line3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) + >>> l = Line3D(p1, p2) + >>> l.direction_ratio + [5, 3, 1] + """ + p1, p2 = self.points + return p1.direction_ratio(p2) + + @property + def direction_cosine(self): + """The normalized direction ratio of a given line in 3D. + + See Also + ======== + + sympy.geometry.line.Line3D.equation + + Examples + ======== + + >>> from sympy import Point3D, Line3D + >>> p1, p2 = Point3D(0, 0, 0), Point3D(5, 3, 1) + >>> l = Line3D(p1, p2) + >>> l.direction_cosine + [sqrt(35)/7, 3*sqrt(35)/35, sqrt(35)/35] + >>> sum(i**2 for i in _) + 1 + """ + p1, p2 = self.points + return p1.direction_cosine(p2) + + +class Line3D(LinearEntity3D, Line): + """An infinite 3D line in space. + + A line is declared with two distinct points or a point and direction_ratio + as defined using keyword `direction_ratio`. + + Parameters + ========== + + p1 : Point3D + pt : Point3D + direction_ratio : list + + See Also + ======== + + sympy.geometry.point.Point3D + sympy.geometry.line.Line + sympy.geometry.line.Line2D + + Examples + ======== + + >>> from sympy import Line3D, Point3D + >>> L = Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) + >>> L + Line3D(Point3D(2, 3, 4), Point3D(3, 5, 1)) + >>> L.points + (Point3D(2, 3, 4), Point3D(3, 5, 1)) + """ + def __new__(cls, p1, pt=None, direction_ratio=(), **kwargs): + if isinstance(p1, LinearEntity3D): + if pt is not None: + raise ValueError('if p1 is a LinearEntity, pt must be None.') + p1, pt = p1.args + else: + p1 = Point(p1, dim=3) + if pt is not None and len(direction_ratio) == 0: + pt = Point(pt, dim=3) + elif len(direction_ratio) == 3 and pt is None: + pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], + p1.z + direction_ratio[2]) + else: + raise ValueError('A 2nd Point or keyword "direction_ratio" must ' + 'be used.') + + return LinearEntity3D.__new__(cls, p1, pt, **kwargs) + + def equation(self, x='x', y='y', z='z'): + """Return the equations that define the line in 3D. + + Parameters + ========== + + x : str, optional + The name to use for the x-axis, default value is 'x'. + y : str, optional + The name to use for the y-axis, default value is 'y'. + z : str, optional + The name to use for the z-axis, default value is 'z'. + + Returns + ======= + + equation : Tuple of simultaneous equations + + Examples + ======== + + >>> from sympy import Point3D, Line3D, solve + >>> from sympy.abc import x, y, z + >>> p1, p2 = Point3D(1, 0, 0), Point3D(5, 3, 0) + >>> l1 = Line3D(p1, p2) + >>> eq = l1.equation(x, y, z); eq + (-3*x + 4*y + 3, z) + >>> solve(eq.subs(z, 0), (x, y, z)) + {x: 4*y/3 + 1} + """ + x, y, z, k = [_symbol(i, real=True) for i in (x, y, z, 'k')] + p1, p2 = self.points + d1, d2, d3 = p1.direction_ratio(p2) + x1, y1, z1 = p1 + eqs = [-d1*k + x - x1, -d2*k + y - y1, -d3*k + z - z1] + # eliminate k from equations by solving first eq with k for k + for i, e in enumerate(eqs): + if e.has(k): + kk = solve(e, k)[0] + eqs.pop(i) + break + return Tuple(*[i.subs(k, kk).as_numer_denom()[0] for i in eqs]) + + def distance(self, other): + """ + Finds the shortest distance between a line and another object. + + Parameters + ========== + + Point3D, Line3D, Plane, tuple, list + + Returns + ======= + + distance + + Notes + ===== + + This method accepts only 3D entities as it's parameter + + Tuples and lists are converted to Point3D and therefore must be of + length 3, 2 or 1. + + NotImplementedError is raised if `other` is not an instance of one + of the specified classes: Point3D, Line3D, or Plane. + + Examples + ======== + + >>> from sympy.geometry import Line3D + >>> l1 = Line3D((0, 0, 0), (0, 0, 1)) + >>> l2 = Line3D((0, 1, 0), (1, 1, 1)) + >>> l1.distance(l2) + 1 + + The computed distance may be symbolic, too: + + >>> from sympy.abc import x, y + >>> l1 = Line3D((0, 0, 0), (0, 0, 1)) + >>> l2 = Line3D((0, x, 0), (y, x, 1)) + >>> l1.distance(l2) + Abs(x*y)/Abs(sqrt(y**2)) + + """ + + from .plane import Plane # Avoid circular import + + if isinstance(other, (tuple, list)): + try: + other = Point3D(other) + except ValueError: + pass + + if isinstance(other, Point3D): + return super().distance(other) + + if isinstance(other, Line3D): + if self == other: + return S.Zero + if self.is_parallel(other): + return super().distance(other.p1) + + # Skew lines + self_direction = Matrix(self.direction_ratio) + other_direction = Matrix(other.direction_ratio) + normal = self_direction.cross(other_direction) + plane_through_self = Plane(p1=self.p1, normal_vector=normal) + return other.p1.distance(plane_through_self) + + if isinstance(other, Plane): + return other.distance(self) + + msg = f"{other} has type {type(other)}, which is unsupported" + raise NotImplementedError(msg) + + +class Ray3D(LinearEntity3D, Ray): + """ + A Ray is a semi-line in the space with a source point and a direction. + + Parameters + ========== + + p1 : Point3D + The source of the Ray + p2 : Point or a direction vector + direction_ratio: Determines the direction in which the Ray propagates. + + + Attributes + ========== + + source + xdirection + ydirection + zdirection + + See Also + ======== + + sympy.geometry.point.Point3D, Line3D + + + Examples + ======== + + >>> from sympy import Point3D, Ray3D + >>> r = Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) + >>> r + Ray3D(Point3D(2, 3, 4), Point3D(3, 5, 0)) + >>> r.points + (Point3D(2, 3, 4), Point3D(3, 5, 0)) + >>> r.source + Point3D(2, 3, 4) + >>> r.xdirection + oo + >>> r.ydirection + oo + >>> r.direction_ratio + [1, 2, -4] + + """ + def __new__(cls, p1, pt=None, direction_ratio=(), **kwargs): + if isinstance(p1, LinearEntity3D): + if pt is not None: + raise ValueError('If p1 is a LinearEntity, pt must be None') + p1, pt = p1.args + else: + p1 = Point(p1, dim=3) + if pt is not None and len(direction_ratio) == 0: + pt = Point(pt, dim=3) + elif len(direction_ratio) == 3 and pt is None: + pt = Point3D(p1.x + direction_ratio[0], p1.y + direction_ratio[1], + p1.z + direction_ratio[2]) + else: + raise ValueError(filldedent(''' + A 2nd Point or keyword "direction_ratio" must be used. + ''')) + + return LinearEntity3D.__new__(cls, p1, pt, **kwargs) + + @property + def xdirection(self): + """The x direction of the ray. + + Positive infinity if the ray points in the positive x direction, + negative infinity if the ray points in the negative x direction, + or 0 if the ray is vertical. + + See Also + ======== + + ydirection + + Examples + ======== + + >>> from sympy import Point3D, Ray3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, -1, 0) + >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) + >>> r1.xdirection + oo + >>> r2.xdirection + 0 + + """ + if self.p1.x < self.p2.x: + return S.Infinity + elif self.p1.x == self.p2.x: + return S.Zero + else: + return S.NegativeInfinity + + @property + def ydirection(self): + """The y direction of the ray. + + Positive infinity if the ray points in the positive y direction, + negative infinity if the ray points in the negative y direction, + or 0 if the ray is horizontal. + + See Also + ======== + + xdirection + + Examples + ======== + + >>> from sympy import Point3D, Ray3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) + >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) + >>> r1.ydirection + -oo + >>> r2.ydirection + 0 + + """ + if self.p1.y < self.p2.y: + return S.Infinity + elif self.p1.y == self.p2.y: + return S.Zero + else: + return S.NegativeInfinity + + @property + def zdirection(self): + """The z direction of the ray. + + Positive infinity if the ray points in the positive z direction, + negative infinity if the ray points in the negative z direction, + or 0 if the ray is horizontal. + + See Also + ======== + + xdirection + + Examples + ======== + + >>> from sympy import Point3D, Ray3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(-1, -1, -1), Point3D(-1, 0, 0) + >>> r1, r2 = Ray3D(p1, p2), Ray3D(p1, p3) + >>> r1.ydirection + -oo + >>> r2.ydirection + 0 + >>> r2.zdirection + 0 + + """ + if self.p1.z < self.p2.z: + return S.Infinity + elif self.p1.z == self.p2.z: + return S.Zero + else: + return S.NegativeInfinity + + +class Segment3D(LinearEntity3D, Segment): + """A line segment in a 3D space. + + Parameters + ========== + + p1 : Point3D + p2 : Point3D + + Attributes + ========== + + length : number or SymPy expression + midpoint : Point3D + + See Also + ======== + + sympy.geometry.point.Point3D, Line3D + + Examples + ======== + + >>> from sympy import Point3D, Segment3D + >>> Segment3D((1, 0, 0), (1, 1, 1)) # tuples are interpreted as pts + Segment3D(Point3D(1, 0, 0), Point3D(1, 1, 1)) + >>> s = Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)); s + Segment3D(Point3D(4, 3, 9), Point3D(1, 1, 7)) + >>> s.points + (Point3D(4, 3, 9), Point3D(1, 1, 7)) + >>> s.length + sqrt(17) + >>> s.midpoint + Point3D(5/2, 2, 8) + + """ + def __new__(cls, p1, p2, **kwargs): + p1 = Point(p1, dim=3) + p2 = Point(p2, dim=3) + + if p1 == p2: + return p1 + + return LinearEntity3D.__new__(cls, p1, p2, **kwargs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/parabola.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/parabola.py new file mode 100644 index 0000000000000000000000000000000000000000..183c593785bb610e6f451a0c87abb2aa34d22494 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/parabola.py @@ -0,0 +1,422 @@ +"""Parabolic geometrical entity. + +Contains +* Parabola + +""" + +from sympy.core import S +from sympy.core.sorting import ordered +from sympy.core.symbol import _symbol, symbols +from sympy.geometry.entity import GeometryEntity, GeometrySet +from sympy.geometry.point import Point, Point2D +from sympy.geometry.line import Line, Line2D, Ray2D, Segment2D, LinearEntity3D +from sympy.geometry.ellipse import Ellipse +from sympy.functions import sign +from sympy.simplify.simplify import simplify +from sympy.solvers.solvers import solve + + +class Parabola(GeometrySet): + """A parabolic GeometryEntity. + + A parabola is declared with a point, that is called 'focus', and + a line, that is called 'directrix'. + Only vertical or horizontal parabolas are currently supported. + + Parameters + ========== + + focus : Point + Default value is Point(0, 0) + directrix : Line + + Attributes + ========== + + focus + directrix + axis of symmetry + focal length + p parameter + vertex + eccentricity + + Raises + ====== + ValueError + When `focus` is not a two dimensional point. + When `focus` is a point of directrix. + NotImplementedError + When `directrix` is neither horizontal nor vertical. + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7,8))) + >>> p1.focus + Point2D(0, 0) + >>> p1.directrix + Line2D(Point2D(5, 8), Point2D(7, 8)) + + """ + + def __new__(cls, focus=None, directrix=None, **kwargs): + + if focus: + focus = Point(focus, dim=2) + else: + focus = Point(0, 0) + + directrix = Line(directrix) + + if directrix.contains(focus): + raise ValueError('The focus must not be a point of directrix') + + return GeometryEntity.__new__(cls, focus, directrix, **kwargs) + + @property + def ambient_dimension(self): + """Returns the ambient dimension of parabola. + + Returns + ======= + + ambient_dimension : integer + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> f1 = Point(0, 0) + >>> p1 = Parabola(f1, Line(Point(5, 8), Point(7, 8))) + >>> p1.ambient_dimension + 2 + + """ + return 2 + + @property + def axis_of_symmetry(self): + """Return the axis of symmetry of the parabola: a line + perpendicular to the directrix passing through the focus. + + Returns + ======= + + axis_of_symmetry : Line + + See Also + ======== + + sympy.geometry.line.Line + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.axis_of_symmetry + Line2D(Point2D(0, 0), Point2D(0, 1)) + + """ + return self.directrix.perpendicular_line(self.focus) + + @property + def directrix(self): + """The directrix of the parabola. + + Returns + ======= + + directrix : Line + + See Also + ======== + + sympy.geometry.line.Line + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> l1 = Line(Point(5, 8), Point(7, 8)) + >>> p1 = Parabola(Point(0, 0), l1) + >>> p1.directrix + Line2D(Point2D(5, 8), Point2D(7, 8)) + + """ + return self.args[1] + + @property + def eccentricity(self): + """The eccentricity of the parabola. + + Returns + ======= + + eccentricity : number + + A parabola may also be characterized as a conic section with an + eccentricity of 1. As a consequence of this, all parabolas are + similar, meaning that while they can be different sizes, + they are all the same shape. + + See Also + ======== + + https://en.wikipedia.org/wiki/Parabola + + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.eccentricity + 1 + + Notes + ----- + The eccentricity for every Parabola is 1 by definition. + + """ + return S.One + + def equation(self, x='x', y='y'): + """The equation of the parabola. + + Parameters + ========== + x : str, optional + Label for the x-axis. Default value is 'x'. + y : str, optional + Label for the y-axis. Default value is 'y'. + + Returns + ======= + equation : SymPy expression + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.equation() + -x**2 - 16*y + 64 + >>> p1.equation('f') + -f**2 - 16*y + 64 + >>> p1.equation(y='z') + -x**2 - 16*z + 64 + + """ + x = _symbol(x, real=True) + y = _symbol(y, real=True) + + m = self.directrix.slope + if m is S.Infinity: + t1 = 4 * (self.p_parameter) * (x - self.vertex.x) + t2 = (y - self.vertex.y)**2 + elif m == 0: + t1 = 4 * (self.p_parameter) * (y - self.vertex.y) + t2 = (x - self.vertex.x)**2 + else: + a, b = self.focus + c, d = self.directrix.coefficients[:2] + t1 = (x - a)**2 + (y - b)**2 + t2 = self.directrix.equation(x, y)**2/(c**2 + d**2) + return t1 - t2 + + @property + def focal_length(self): + """The focal length of the parabola. + + Returns + ======= + + focal_lenght : number or symbolic expression + + Notes + ===== + + The distance between the vertex and the focus + (or the vertex and directrix), measured along the axis + of symmetry, is the "focal length". + + See Also + ======== + + https://en.wikipedia.org/wiki/Parabola + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.focal_length + 4 + + """ + distance = self.directrix.distance(self.focus) + focal_length = distance/2 + + return focal_length + + @property + def focus(self): + """The focus of the parabola. + + Returns + ======= + + focus : Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> f1 = Point(0, 0) + >>> p1 = Parabola(f1, Line(Point(5, 8), Point(7, 8))) + >>> p1.focus + Point2D(0, 0) + + """ + return self.args[0] + + def intersection(self, o): + """The intersection of the parabola and another geometrical entity `o`. + + Parameters + ========== + + o : GeometryEntity, LinearEntity + + Returns + ======= + + intersection : list of GeometryEntity objects + + Examples + ======== + + >>> from sympy import Parabola, Point, Ellipse, Line, Segment + >>> p1 = Point(0,0) + >>> l1 = Line(Point(1, -2), Point(-1,-2)) + >>> parabola1 = Parabola(p1, l1) + >>> parabola1.intersection(Ellipse(Point(0, 0), 2, 5)) + [Point2D(-2, 0), Point2D(2, 0)] + >>> parabola1.intersection(Line(Point(-7, 3), Point(12, 3))) + [Point2D(-4, 3), Point2D(4, 3)] + >>> parabola1.intersection(Segment((-12, -65), (14, -68))) + [] + + """ + x, y = symbols('x y', real=True) + parabola_eq = self.equation() + if isinstance(o, Parabola): + if o in self: + return [o] + else: + return list(ordered([Point(i) for i in solve( + [parabola_eq, o.equation()], [x, y], set=True)[1]])) + elif isinstance(o, Point2D): + if simplify(parabola_eq.subs([(x, o._args[0]), (y, o._args[1])])) == 0: + return [o] + else: + return [] + elif isinstance(o, (Segment2D, Ray2D)): + result = solve([parabola_eq, + Line2D(o.points[0], o.points[1]).equation()], + [x, y], set=True)[1] + return list(ordered([Point2D(i) for i in result if i in o])) + elif isinstance(o, (Line2D, Ellipse)): + return list(ordered([Point2D(i) for i in solve( + [parabola_eq, o.equation()], [x, y], set=True)[1]])) + elif isinstance(o, LinearEntity3D): + raise TypeError('Entity must be two dimensional, not three dimensional') + else: + raise TypeError('Wrong type of argument were put') + + @property + def p_parameter(self): + """P is a parameter of parabola. + + Returns + ======= + + p : number or symbolic expression + + Notes + ===== + + The absolute value of p is the focal length. The sign on p tells + which way the parabola faces. Vertical parabolas that open up + and horizontal that open right, give a positive value for p. + Vertical parabolas that open down and horizontal that open left, + give a negative value for p. + + + See Also + ======== + + https://www.sparknotes.com/math/precalc/conicsections/section2/ + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.p_parameter + -4 + + """ + m = self.directrix.slope + if m is S.Infinity: + x = self.directrix.coefficients[2] + p = sign(self.focus.args[0] + x) + elif m == 0: + y = self.directrix.coefficients[2] + p = sign(self.focus.args[1] + y) + else: + d = self.directrix.projection(self.focus) + p = sign(self.focus.x - d.x) + return p * self.focal_length + + @property + def vertex(self): + """The vertex of the parabola. + + Returns + ======= + + vertex : Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Parabola, Point, Line + >>> p1 = Parabola(Point(0, 0), Line(Point(5, 8), Point(7, 8))) + >>> p1.vertex + Point2D(0, 4) + + """ + focus = self.focus + m = self.directrix.slope + if m is S.Infinity: + vertex = Point(focus.args[0] - self.p_parameter, focus.args[1]) + elif m == 0: + vertex = Point(focus.args[0], focus.args[1] - self.p_parameter) + else: + vertex = self.axis_of_symmetry.intersection(self)[0] + return vertex diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/plane.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/plane.py new file mode 100644 index 0000000000000000000000000000000000000000..509dc4be5dc41c5df7c33561fdbe5bb0b6620352 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/plane.py @@ -0,0 +1,878 @@ +"""Geometrical Planes. + +Contains +======== +Plane + +""" + +from sympy.core import Dummy, Rational, S, Symbol +from sympy.core.symbol import _symbol +from sympy.functions.elementary.trigonometric import cos, sin, acos, asin, sqrt +from .entity import GeometryEntity +from .line import (Line, Ray, Segment, Line3D, LinearEntity, LinearEntity3D, + Ray3D, Segment3D) +from .point import Point, Point3D +from sympy.matrices import Matrix +from sympy.polys.polytools import cancel +from sympy.solvers import solve, linsolve +from sympy.utilities.iterables import uniq, is_sequence +from sympy.utilities.misc import filldedent, func_name, Undecidable + +from mpmath.libmp.libmpf import prec_to_dps + +import random + + +x, y, z, t = [Dummy('plane_dummy') for i in range(4)] + + +class Plane(GeometryEntity): + """ + A plane is a flat, two-dimensional surface. A plane is the two-dimensional + analogue of a point (zero-dimensions), a line (one-dimension) and a solid + (three-dimensions). A plane can generally be constructed by two types of + inputs. They are: + - three non-collinear points + - a point and the plane's normal vector + + Attributes + ========== + + p1 + normal_vector + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> Plane(Point3D(1, 1, 1), Point3D(2, 3, 4), Point3D(2, 2, 2)) + Plane(Point3D(1, 1, 1), (-1, 2, -1)) + >>> Plane((1, 1, 1), (2, 3, 4), (2, 2, 2)) + Plane(Point3D(1, 1, 1), (-1, 2, -1)) + >>> Plane(Point3D(1, 1, 1), normal_vector=(1,4,7)) + Plane(Point3D(1, 1, 1), (1, 4, 7)) + + """ + def __new__(cls, p1, a=None, b=None, **kwargs): + p1 = Point3D(p1, dim=3) + if a and b: + p2 = Point(a, dim=3) + p3 = Point(b, dim=3) + if Point3D.are_collinear(p1, p2, p3): + raise ValueError('Enter three non-collinear points') + a = p1.direction_ratio(p2) + b = p1.direction_ratio(p3) + normal_vector = tuple(Matrix(a).cross(Matrix(b))) + else: + a = kwargs.pop('normal_vector', a) + evaluate = kwargs.get('evaluate', True) + if is_sequence(a) and len(a) == 3: + normal_vector = Point3D(a).args if evaluate else a + else: + raise ValueError(filldedent(''' + Either provide 3 3D points or a point with a + normal vector expressed as a sequence of length 3''')) + if all(coord.is_zero for coord in normal_vector): + raise ValueError('Normal vector cannot be zero vector') + return GeometryEntity.__new__(cls, p1, normal_vector, **kwargs) + + def __contains__(self, o): + k = self.equation(x, y, z) + if isinstance(o, (LinearEntity, LinearEntity3D)): + d = Point3D(o.arbitrary_point(t)) + e = k.subs([(x, d.x), (y, d.y), (z, d.z)]) + return e.equals(0) + try: + o = Point(o, dim=3, strict=True) + d = k.xreplace(dict(zip((x, y, z), o.args))) + return d.equals(0) + except TypeError: + return False + + def _eval_evalf(self, prec=15, **options): + pt, tup = self.args + dps = prec_to_dps(prec) + pt = pt.evalf(n=dps, **options) + tup = tuple([i.evalf(n=dps, **options) for i in tup]) + return self.func(pt, normal_vector=tup, evaluate=False) + + def angle_between(self, o): + """Angle between the plane and other geometric entity. + + Parameters + ========== + + LinearEntity3D, Plane. + + Returns + ======= + + angle : angle in radians + + Notes + ===== + + This method accepts only 3D entities as it's parameter, but if you want + to calculate the angle between a 2D entity and a plane you should + first convert to a 3D entity by projecting onto a desired plane and + then proceed to calculate the angle. + + Examples + ======== + + >>> from sympy import Point3D, Line3D, Plane + >>> a = Plane(Point3D(1, 2, 2), normal_vector=(1, 2, 3)) + >>> b = Line3D(Point3D(1, 3, 4), Point3D(2, 2, 2)) + >>> a.angle_between(b) + -asin(sqrt(21)/6) + + """ + if isinstance(o, LinearEntity3D): + a = Matrix(self.normal_vector) + b = Matrix(o.direction_ratio) + c = a.dot(b) + d = sqrt(sum(i**2 for i in self.normal_vector)) + e = sqrt(sum(i**2 for i in o.direction_ratio)) + return asin(c/(d*e)) + if isinstance(o, Plane): + a = Matrix(self.normal_vector) + b = Matrix(o.normal_vector) + c = a.dot(b) + d = sqrt(sum(i**2 for i in self.normal_vector)) + e = sqrt(sum(i**2 for i in o.normal_vector)) + return acos(c/(d*e)) + + + def arbitrary_point(self, u=None, v=None): + """ Returns an arbitrary point on the Plane. If given two + parameters, the point ranges over the entire plane. If given 1 + or no parameters, returns a point with one parameter which, + when varying from 0 to 2*pi, moves the point in a circle of + radius 1 about p1 of the Plane. + + Examples + ======== + + >>> from sympy import Plane, Ray + >>> from sympy.abc import u, v, t, r + >>> p = Plane((1, 1, 1), normal_vector=(1, 0, 0)) + >>> p.arbitrary_point(u, v) + Point3D(1, u + 1, v + 1) + >>> p.arbitrary_point(t) + Point3D(1, cos(t) + 1, sin(t) + 1) + + While arbitrary values of u and v can move the point anywhere in + the plane, the single-parameter point can be used to construct a + ray whose arbitrary point can be located at angle t and radius + r from p.p1: + + >>> Ray(p.p1, _).arbitrary_point(r) + Point3D(1, r*cos(t) + 1, r*sin(t) + 1) + + Returns + ======= + + Point3D + + """ + circle = v is None + if circle: + u = _symbol(u or 't', real=True) + else: + u = _symbol(u or 'u', real=True) + v = _symbol(v or 'v', real=True) + x, y, z = self.normal_vector + a, b, c = self.p1.args + # x1, y1, z1 is a nonzero vector parallel to the plane + if x.is_zero and y.is_zero: + x1, y1, z1 = S.One, S.Zero, S.Zero + else: + x1, y1, z1 = -y, x, S.Zero + # x2, y2, z2 is also parallel to the plane, and orthogonal to x1, y1, z1 + x2, y2, z2 = tuple(Matrix((x, y, z)).cross(Matrix((x1, y1, z1)))) + if circle: + x1, y1, z1 = (w/sqrt(x1**2 + y1**2 + z1**2) for w in (x1, y1, z1)) + x2, y2, z2 = (w/sqrt(x2**2 + y2**2 + z2**2) for w in (x2, y2, z2)) + p = Point3D(a + x1*cos(u) + x2*sin(u), \ + b + y1*cos(u) + y2*sin(u), \ + c + z1*cos(u) + z2*sin(u)) + else: + p = Point3D(a + x1*u + x2*v, b + y1*u + y2*v, c + z1*u + z2*v) + return p + + + @staticmethod + def are_concurrent(*planes): + """Is a sequence of Planes concurrent? + + Two or more Planes are concurrent if their intersections + are a common line. + + Parameters + ========== + + planes: list + + Returns + ======= + + Boolean + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(5, 0, 0), normal_vector=(1, -1, 1)) + >>> b = Plane(Point3D(0, -2, 0), normal_vector=(3, 1, 1)) + >>> c = Plane(Point3D(0, -1, 0), normal_vector=(5, -1, 9)) + >>> Plane.are_concurrent(a, b) + True + >>> Plane.are_concurrent(a, b, c) + False + + """ + planes = list(uniq(planes)) + for i in planes: + if not isinstance(i, Plane): + raise ValueError('All objects should be Planes but got %s' % i.func) + if len(planes) < 2: + return False + planes = list(planes) + first = planes.pop(0) + sol = first.intersection(planes[0]) + if sol == []: + return False + else: + line = sol[0] + for i in planes[1:]: + l = first.intersection(i) + if not l or l[0] not in line: + return False + return True + + + def distance(self, o): + """Distance between the plane and another geometric entity. + + Parameters + ========== + + Point3D, LinearEntity3D, Plane. + + Returns + ======= + + distance + + Notes + ===== + + This method accepts only 3D entities as it's parameter, but if you want + to calculate the distance between a 2D entity and a plane you should + first convert to a 3D entity by projecting onto a desired plane and + then proceed to calculate the distance. + + Examples + ======== + + >>> from sympy import Point3D, Line3D, Plane + >>> a = Plane(Point3D(1, 1, 1), normal_vector=(1, 1, 1)) + >>> b = Point3D(1, 2, 3) + >>> a.distance(b) + sqrt(3) + >>> c = Line3D(Point3D(2, 3, 1), Point3D(1, 2, 2)) + >>> a.distance(c) + 0 + + """ + if self.intersection(o) != []: + return S.Zero + + if isinstance(o, (Segment3D, Ray3D)): + a, b = o.p1, o.p2 + pi, = self.intersection(Line3D(a, b)) + if pi in o: + return self.distance(pi) + elif a in Segment3D(pi, b): + return self.distance(a) + else: + assert isinstance(o, Segment3D) is True + return self.distance(b) + + # following code handles `Point3D`, `LinearEntity3D`, `Plane` + a = o if isinstance(o, Point3D) else o.p1 + n = Point3D(self.normal_vector).unit + d = (a - self.p1).dot(n) + return abs(d) + + + def equals(self, o): + """ + Returns True if self and o are the same mathematical entities. + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(1, 2, 3), normal_vector=(1, 1, 1)) + >>> b = Plane(Point3D(1, 2, 3), normal_vector=(2, 2, 2)) + >>> c = Plane(Point3D(1, 2, 3), normal_vector=(-1, 4, 6)) + >>> a.equals(a) + True + >>> a.equals(b) + True + >>> a.equals(c) + False + """ + if isinstance(o, Plane): + a = self.equation() + b = o.equation() + return cancel(a/b).is_constant() + else: + return False + + + def equation(self, x=None, y=None, z=None): + """The equation of the Plane. + + Examples + ======== + + >>> from sympy import Point3D, Plane + >>> a = Plane(Point3D(1, 1, 2), Point3D(2, 4, 7), Point3D(3, 5, 1)) + >>> a.equation() + -23*x + 11*y - 2*z + 16 + >>> a = Plane(Point3D(1, 4, 2), normal_vector=(6, 6, 6)) + >>> a.equation() + 6*x + 6*y + 6*z - 42 + + """ + x, y, z = [i if i else Symbol(j, real=True) for i, j in zip((x, y, z), 'xyz')] + a = Point3D(x, y, z) + b = self.p1.direction_ratio(a) + c = self.normal_vector + return (sum(i*j for i, j in zip(b, c))) + + + def intersection(self, o): + """ The intersection with other geometrical entity. + + Parameters + ========== + + Point, Point3D, LinearEntity, LinearEntity3D, Plane + + Returns + ======= + + List + + Examples + ======== + + >>> from sympy import Point3D, Line3D, Plane + >>> a = Plane(Point3D(1, 2, 3), normal_vector=(1, 1, 1)) + >>> b = Point3D(1, 2, 3) + >>> a.intersection(b) + [Point3D(1, 2, 3)] + >>> c = Line3D(Point3D(1, 4, 7), Point3D(2, 2, 2)) + >>> a.intersection(c) + [Point3D(2, 2, 2)] + >>> d = Plane(Point3D(6, 0, 0), normal_vector=(2, -5, 3)) + >>> e = Plane(Point3D(2, 0, 0), normal_vector=(3, 4, -3)) + >>> d.intersection(e) + [Line3D(Point3D(78/23, -24/23, 0), Point3D(147/23, 321/23, 23))] + + """ + if not isinstance(o, GeometryEntity): + o = Point(o, dim=3) + if isinstance(o, Point): + if o in self: + return [o] + else: + return [] + if isinstance(o, (LinearEntity, LinearEntity3D)): + # recast to 3D + p1, p2 = o.p1, o.p2 + if isinstance(o, Segment): + o = Segment3D(p1, p2) + elif isinstance(o, Ray): + o = Ray3D(p1, p2) + elif isinstance(o, Line): + o = Line3D(p1, p2) + else: + raise ValueError('unhandled linear entity: %s' % o.func) + if o in self: + return [o] + else: + a = Point3D(o.arbitrary_point(t)) + p1, n = self.p1, Point3D(self.normal_vector) + + # TODO: Replace solve with solveset, when this line is tested + c = solve((a - p1).dot(n), t) + if not c: + return [] + else: + c = [i for i in c if i.is_real is not False] + if len(c) > 1: + c = [i for i in c if i.is_real] + if len(c) != 1: + raise Undecidable("not sure which point is real") + p = a.subs(t, c[0]) + if p not in o: + return [] # e.g. a segment might not intersect a plane + return [p] + if isinstance(o, Plane): + if self.equals(o): + return [self] + if self.is_parallel(o): + return [] + else: + x, y, z = map(Dummy, 'xyz') + a, b = Matrix([self.normal_vector]), Matrix([o.normal_vector]) + c = list(a.cross(b)) + d = self.equation(x, y, z) + e = o.equation(x, y, z) + result = list(linsolve([d, e], x, y, z))[0] + for i in (x, y, z): result = result.subs(i, 0) + return [Line3D(Point3D(result), direction_ratio=c)] + + + def is_coplanar(self, o): + """ Returns True if `o` is coplanar with self, else False. + + Examples + ======== + + >>> from sympy import Plane + >>> o = (0, 0, 0) + >>> p = Plane(o, (1, 1, 1)) + >>> p2 = Plane(o, (2, 2, 2)) + >>> p == p2 + False + >>> p.is_coplanar(p2) + True + """ + if isinstance(o, Plane): + return not cancel(self.equation(x, y, z)/o.equation(x, y, z)).has(x, y, z) + if isinstance(o, Point3D): + return o in self + elif isinstance(o, LinearEntity3D): + return all(i in self for i in self) + elif isinstance(o, GeometryEntity): # XXX should only be handling 2D objects now + return all(i == 0 for i in self.normal_vector[:2]) + + + def is_parallel(self, l): + """Is the given geometric entity parallel to the plane? + + Parameters + ========== + + LinearEntity3D or Plane + + Returns + ======= + + Boolean + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(1,4,6), normal_vector=(2, 4, 6)) + >>> b = Plane(Point3D(3,1,3), normal_vector=(4, 8, 12)) + >>> a.is_parallel(b) + True + + """ + if isinstance(l, LinearEntity3D): + a = l.direction_ratio + b = self.normal_vector + return sum(i*j for i, j in zip(a, b)) == 0 + if isinstance(l, Plane): + a = Matrix(l.normal_vector) + b = Matrix(self.normal_vector) + return bool(a.cross(b).is_zero_matrix) + + + def is_perpendicular(self, l): + """Is the given geometric entity perpendicualar to the given plane? + + Parameters + ========== + + LinearEntity3D or Plane + + Returns + ======= + + Boolean + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(1,4,6), normal_vector=(2, 4, 6)) + >>> b = Plane(Point3D(2, 2, 2), normal_vector=(-1, 2, -1)) + >>> a.is_perpendicular(b) + True + + """ + if isinstance(l, LinearEntity3D): + a = Matrix(l.direction_ratio) + b = Matrix(self.normal_vector) + if a.cross(b).is_zero_matrix: + return True + else: + return False + elif isinstance(l, Plane): + a = Matrix(l.normal_vector) + b = Matrix(self.normal_vector) + if a.dot(b) == 0: + return True + else: + return False + else: + return False + + @property + def normal_vector(self): + """Normal vector of the given plane. + + Examples + ======== + + >>> from sympy import Point3D, Plane + >>> a = Plane(Point3D(1, 1, 1), Point3D(2, 3, 4), Point3D(2, 2, 2)) + >>> a.normal_vector + (-1, 2, -1) + >>> a = Plane(Point3D(1, 1, 1), normal_vector=(1, 4, 7)) + >>> a.normal_vector + (1, 4, 7) + + """ + return self.args[1] + + @property + def p1(self): + """The only defining point of the plane. Others can be obtained from the + arbitrary_point method. + + See Also + ======== + + sympy.geometry.point.Point3D + + Examples + ======== + + >>> from sympy import Point3D, Plane + >>> a = Plane(Point3D(1, 1, 1), Point3D(2, 3, 4), Point3D(2, 2, 2)) + >>> a.p1 + Point3D(1, 1, 1) + + """ + return self.args[0] + + def parallel_plane(self, pt): + """ + Plane parallel to the given plane and passing through the point pt. + + Parameters + ========== + + pt: Point3D + + Returns + ======= + + Plane + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(1, 4, 6), normal_vector=(2, 4, 6)) + >>> a.parallel_plane(Point3D(2, 3, 5)) + Plane(Point3D(2, 3, 5), (2, 4, 6)) + + """ + a = self.normal_vector + return Plane(pt, normal_vector=a) + + def perpendicular_line(self, pt): + """A line perpendicular to the given plane. + + Parameters + ========== + + pt: Point3D + + Returns + ======= + + Line3D + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a = Plane(Point3D(1,4,6), normal_vector=(2, 4, 6)) + >>> a.perpendicular_line(Point3D(9, 8, 7)) + Line3D(Point3D(9, 8, 7), Point3D(11, 12, 13)) + + """ + a = self.normal_vector + return Line3D(pt, direction_ratio=a) + + def perpendicular_plane(self, *pts): + """ + Return a perpendicular passing through the given points. If the + direction ratio between the points is the same as the Plane's normal + vector then, to select from the infinite number of possible planes, + a third point will be chosen on the z-axis (or the y-axis + if the normal vector is already parallel to the z-axis). If less than + two points are given they will be supplied as follows: if no point is + given then pt1 will be self.p1; if a second point is not given it will + be a point through pt1 on a line parallel to the z-axis (if the normal + is not already the z-axis, otherwise on the line parallel to the + y-axis). + + Parameters + ========== + + pts: 0, 1 or 2 Point3D + + Returns + ======= + + Plane + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> a, b = Point3D(0, 0, 0), Point3D(0, 1, 0) + >>> Z = (0, 0, 1) + >>> p = Plane(a, normal_vector=Z) + >>> p.perpendicular_plane(a, b) + Plane(Point3D(0, 0, 0), (1, 0, 0)) + """ + if len(pts) > 2: + raise ValueError('No more than 2 pts should be provided.') + + pts = list(pts) + if len(pts) == 0: + pts.append(self.p1) + if len(pts) == 1: + x, y, z = self.normal_vector + if x == y == 0: + dir = (0, 1, 0) + else: + dir = (0, 0, 1) + pts.append(pts[0] + Point3D(*dir)) + + p1, p2 = [Point(i, dim=3) for i in pts] + l = Line3D(p1, p2) + n = Line3D(p1, direction_ratio=self.normal_vector) + if l in n: # XXX should an error be raised instead? + # there are infinitely many perpendicular planes; + x, y, z = self.normal_vector + if x == y == 0: + # the z axis is the normal so pick a pt on the y-axis + p3 = Point3D(0, 1, 0) # case 1 + else: + # else pick a pt on the z axis + p3 = Point3D(0, 0, 1) # case 2 + # in case that point is already given, move it a bit + if p3 in l: + p3 *= 2 # case 3 + else: + p3 = p1 + Point3D(*self.normal_vector) # case 4 + return Plane(p1, p2, p3) + + def projection_line(self, line): + """Project the given line onto the plane through the normal plane + containing the line. + + Parameters + ========== + + LinearEntity or LinearEntity3D + + Returns + ======= + + Point3D, Line3D, Ray3D or Segment3D + + Notes + ===== + + For the interaction between 2D and 3D lines(segments, rays), you should + convert the line to 3D by using this method. For example for finding the + intersection between a 2D and a 3D line, convert the 2D line to a 3D line + by projecting it on a required plane and then proceed to find the + intersection between those lines. + + Examples + ======== + + >>> from sympy import Plane, Line, Line3D, Point3D + >>> a = Plane(Point3D(1, 1, 1), normal_vector=(1, 1, 1)) + >>> b = Line(Point3D(1, 1), Point3D(2, 2)) + >>> a.projection_line(b) + Line3D(Point3D(4/3, 4/3, 1/3), Point3D(5/3, 5/3, -1/3)) + >>> c = Line3D(Point3D(1, 1, 1), Point3D(2, 2, 2)) + >>> a.projection_line(c) + Point3D(1, 1, 1) + + """ + if not isinstance(line, (LinearEntity, LinearEntity3D)): + raise NotImplementedError('Enter a linear entity only') + a, b = self.projection(line.p1), self.projection(line.p2) + if a == b: + # projection does not imply intersection so for + # this case (line parallel to plane's normal) we + # return the projection point + return a + if isinstance(line, (Line, Line3D)): + return Line3D(a, b) + if isinstance(line, (Ray, Ray3D)): + return Ray3D(a, b) + if isinstance(line, (Segment, Segment3D)): + return Segment3D(a, b) + + def projection(self, pt): + """Project the given point onto the plane along the plane normal. + + Parameters + ========== + + Point or Point3D + + Returns + ======= + + Point3D + + Examples + ======== + + >>> from sympy import Plane, Point3D + >>> A = Plane(Point3D(1, 1, 2), normal_vector=(1, 1, 1)) + + The projection is along the normal vector direction, not the z + axis, so (1, 1) does not project to (1, 1, 2) on the plane A: + + >>> b = Point3D(1, 1) + >>> A.projection(b) + Point3D(5/3, 5/3, 2/3) + >>> _ in A + True + + But the point (1, 1, 2) projects to (1, 1) on the XY-plane: + + >>> XY = Plane((0, 0, 0), (0, 0, 1)) + >>> XY.projection((1, 1, 2)) + Point3D(1, 1, 0) + """ + rv = Point(pt, dim=3) + if rv in self: + return rv + return self.intersection(Line3D(rv, rv + Point3D(self.normal_vector)))[0] + + def random_point(self, seed=None): + """ Returns a random point on the Plane. + + Returns + ======= + + Point3D + + Examples + ======== + + >>> from sympy import Plane + >>> p = Plane((1, 0, 0), normal_vector=(0, 1, 0)) + >>> r = p.random_point(seed=42) # seed value is optional + >>> r.n(3) + Point3D(2.29, 0, -1.35) + + The random point can be moved to lie on the circle of radius + 1 centered on p1: + + >>> c = p.p1 + (r - p.p1).unit + >>> c.distance(p.p1).equals(1) + True + """ + if seed is not None: + rng = random.Random(seed) + else: + rng = random + params = { + x: 2*Rational(rng.gauss(0, 1)) - 1, + y: 2*Rational(rng.gauss(0, 1)) - 1} + return self.arbitrary_point(x, y).subs(params) + + def parameter_value(self, other, u, v=None): + """Return the parameter(s) corresponding to the given point. + + Examples + ======== + + >>> from sympy import pi, Plane + >>> from sympy.abc import t, u, v + >>> p = Plane((2, 0, 0), (0, 0, 1), (0, 1, 0)) + + By default, the parameter value returned defines a point + that is a distance of 1 from the Plane's p1 value and + in line with the given point: + + >>> on_circle = p.arbitrary_point(t).subs(t, pi/4) + >>> on_circle.distance(p.p1) + 1 + >>> p.parameter_value(on_circle, t) + {t: pi/4} + + Moving the point twice as far from p1 does not change + the parameter value: + + >>> off_circle = p.p1 + (on_circle - p.p1)*2 + >>> off_circle.distance(p.p1) + 2 + >>> p.parameter_value(off_circle, t) + {t: pi/4} + + If the 2-value parameter is desired, supply the two + parameter symbols and a replacement dictionary will + be returned: + + >>> p.parameter_value(on_circle, u, v) + {u: sqrt(10)/10, v: sqrt(10)/30} + >>> p.parameter_value(off_circle, u, v) + {u: sqrt(10)/5, v: sqrt(10)/15} + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if not isinstance(other, Point): + raise ValueError("other must be a point") + if other == self.p1: + return other + if isinstance(u, Symbol) and v is None: + delta = self.arbitrary_point(u) - self.p1 + eq = delta - (other - self.p1).unit + sol = solve(eq, u, dict=True) + elif isinstance(u, Symbol) and isinstance(v, Symbol): + pt = self.arbitrary_point(u, v) + sol = solve(pt - other, (u, v), dict=True) + else: + raise ValueError('expecting 1 or 2 symbols') + if not sol: + raise ValueError("Given point is not on %s" % func_name(self)) + return sol[0] # {t: tval} or {u: uval, v: vval} + + @property + def ambient_dimension(self): + return self.p1.ambient_dimension diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/point.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/point.py new file mode 100644 index 0000000000000000000000000000000000000000..19e6c566f06de4df086912470dc35d0f4af3bd38 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/point.py @@ -0,0 +1,1378 @@ +"""Geometrical Points. + +Contains +======== +Point +Point2D +Point3D + +When methods of Point require 1 or more points as arguments, they +can be passed as a sequence of coordinates or Points: + +>>> from sympy import Point +>>> Point(1, 1).is_collinear((2, 2), (3, 4)) +False +>>> Point(1, 1).is_collinear(Point(2, 2), Point(3, 4)) +False + +""" + +import warnings + +from sympy.core import S, sympify, Expr +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.numbers import Float +from sympy.core.parameters import global_parameters +from sympy.simplify.simplify import nsimplify, simplify +from sympy.geometry.exceptions import GeometryError +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.complexes import im +from sympy.functions.elementary.trigonometric import cos, sin +from sympy.matrices import Matrix +from sympy.matrices.expressions import Transpose +from sympy.utilities.iterables import uniq, is_sequence +from sympy.utilities.misc import filldedent, func_name, Undecidable + +from .entity import GeometryEntity + +from mpmath.libmp.libmpf import prec_to_dps + + +class Point(GeometryEntity): + """A point in a n-dimensional Euclidean space. + + Parameters + ========== + + coords : sequence of n-coordinate values. In the special + case where n=2 or 3, a Point2D or Point3D will be created + as appropriate. + evaluate : if `True` (default), all floats are turn into + exact types. + dim : number of coordinates the point should have. If coordinates + are unspecified, they are padded with zeros. + on_morph : indicates what should happen when the number of + coordinates of a point need to be changed by adding or + removing zeros. Possible values are `'warn'`, `'error'`, or + `ignore` (default). No warning or error is given when `*args` + is empty and `dim` is given. An error is always raised when + trying to remove nonzero coordinates. + + + Attributes + ========== + + length + origin: A `Point` representing the origin of the + appropriately-dimensioned space. + + Raises + ====== + + TypeError : When instantiating with anything but a Point or sequence + ValueError : when instantiating with a sequence with length < 2 or + when trying to reduce dimensions if keyword `on_morph='error'` is + set. + + See Also + ======== + + sympy.geometry.line.Segment : Connects two Points + + Examples + ======== + + >>> from sympy import Point + >>> from sympy.abc import x + >>> Point(1, 2, 3) + Point3D(1, 2, 3) + >>> Point([1, 2]) + Point2D(1, 2) + >>> Point(0, x) + Point2D(0, x) + >>> Point(dim=4) + Point(0, 0, 0, 0) + + Floats are automatically converted to Rational unless the + evaluate flag is False: + + >>> Point(0.5, 0.25) + Point2D(1/2, 1/4) + >>> Point(0.5, 0.25, evaluate=False) + Point2D(0.5, 0.25) + + """ + + is_Point = True + + def __new__(cls, *args, **kwargs): + evaluate = kwargs.get('evaluate', global_parameters.evaluate) + on_morph = kwargs.get('on_morph', 'ignore') + + # unpack into coords + coords = args[0] if len(args) == 1 else args + + # check args and handle quickly handle Point instances + if isinstance(coords, Point): + # even if we're mutating the dimension of a point, we + # don't reevaluate its coordinates + evaluate = False + if len(coords) == kwargs.get('dim', len(coords)): + return coords + + if not is_sequence(coords): + raise TypeError(filldedent(''' + Expecting sequence of coordinates, not `{}`''' + .format(func_name(coords)))) + # A point where only `dim` is specified is initialized + # to zeros. + if len(coords) == 0 and kwargs.get('dim', None): + coords = (S.Zero,)*kwargs.get('dim') + + coords = Tuple(*coords) + dim = kwargs.get('dim', len(coords)) + + if len(coords) < 2: + raise ValueError(filldedent(''' + Point requires 2 or more coordinates or + keyword `dim` > 1.''')) + if len(coords) != dim: + message = ("Dimension of {} needs to be changed " + "from {} to {}.").format(coords, len(coords), dim) + if on_morph == 'ignore': + pass + elif on_morph == "error": + raise ValueError(message) + elif on_morph == 'warn': + warnings.warn(message, stacklevel=2) + else: + raise ValueError(filldedent(''' + on_morph value should be 'error', + 'warn' or 'ignore'.''')) + if any(coords[dim:]): + raise ValueError('Nonzero coordinates cannot be removed.') + if any(a.is_number and im(a).is_zero is False for a in coords): + raise ValueError('Imaginary coordinates are not permitted.') + if not all(isinstance(a, Expr) for a in coords): + raise TypeError('Coordinates must be valid SymPy expressions.') + + # pad with zeros appropriately + coords = coords[:dim] + (S.Zero,)*(dim - len(coords)) + + # Turn any Floats into rationals and simplify + # any expressions before we instantiate + if evaluate: + coords = coords.xreplace({ + f: simplify(nsimplify(f, rational=True)) + for f in coords.atoms(Float)}) + + # return 2D or 3D instances + if len(coords) == 2: + kwargs['_nocheck'] = True + return Point2D(*coords, **kwargs) + elif len(coords) == 3: + kwargs['_nocheck'] = True + return Point3D(*coords, **kwargs) + + # the general Point + return GeometryEntity.__new__(cls, *coords) + + def __abs__(self): + """Returns the distance between this point and the origin.""" + origin = Point([0]*len(self)) + return Point.distance(origin, self) + + def __add__(self, other): + """Add other to self by incrementing self's coordinates by + those of other. + + Notes + ===== + + >>> from sympy import Point + + When sequences of coordinates are passed to Point methods, they + are converted to a Point internally. This __add__ method does + not do that so if floating point values are used, a floating + point result (in terms of SymPy Floats) will be returned. + + >>> Point(1, 2) + (.1, .2) + Point2D(1.1, 2.2) + + If this is not desired, the `translate` method can be used or + another Point can be added: + + >>> Point(1, 2).translate(.1, .2) + Point2D(11/10, 11/5) + >>> Point(1, 2) + Point(.1, .2) + Point2D(11/10, 11/5) + + See Also + ======== + + sympy.geometry.point.Point.translate + + """ + try: + s, o = Point._normalize_dimension(self, Point(other, evaluate=False)) + except TypeError: + raise GeometryError("Don't know how to add {} and a Point object".format(other)) + + coords = [simplify(a + b) for a, b in zip(s, o)] + return Point(coords, evaluate=False) + + def __contains__(self, item): + return item in self.args + + def __truediv__(self, divisor): + """Divide point's coordinates by a factor.""" + divisor = sympify(divisor) + coords = [simplify(x/divisor) for x in self.args] + return Point(coords, evaluate=False) + + def __eq__(self, other): + if not isinstance(other, Point) or len(self.args) != len(other.args): + return False + return self.args == other.args + + def __getitem__(self, key): + return self.args[key] + + def __hash__(self): + return hash(self.args) + + def __iter__(self): + return self.args.__iter__() + + def __len__(self): + return len(self.args) + + def __mul__(self, factor): + """Multiply point's coordinates by a factor. + + Notes + ===== + + >>> from sympy import Point + + When multiplying a Point by a floating point number, + the coordinates of the Point will be changed to Floats: + + >>> Point(1, 2)*0.1 + Point2D(0.1, 0.2) + + If this is not desired, the `scale` method can be used or + else only multiply or divide by integers: + + >>> Point(1, 2).scale(1.1, 1.1) + Point2D(11/10, 11/5) + >>> Point(1, 2)*11/10 + Point2D(11/10, 11/5) + + See Also + ======== + + sympy.geometry.point.Point.scale + """ + factor = sympify(factor) + coords = [simplify(x*factor) for x in self.args] + return Point(coords, evaluate=False) + + def __rmul__(self, factor): + """Multiply a factor by point's coordinates.""" + return self.__mul__(factor) + + def __neg__(self): + """Negate the point.""" + coords = [-x for x in self.args] + return Point(coords, evaluate=False) + + def __sub__(self, other): + """Subtract two points, or subtract a factor from this point's + coordinates.""" + return self + [-x for x in other] + + @classmethod + def _normalize_dimension(cls, *points, **kwargs): + """Ensure that points have the same dimension. + By default `on_morph='warn'` is passed to the + `Point` constructor.""" + # if we have a built-in ambient dimension, use it + dim = getattr(cls, '_ambient_dimension', None) + # override if we specified it + dim = kwargs.get('dim', dim) + # if no dim was given, use the highest dimensional point + if dim is None: + dim = max(i.ambient_dimension for i in points) + if all(i.ambient_dimension == dim for i in points): + return list(points) + kwargs['dim'] = dim + kwargs['on_morph'] = kwargs.get('on_morph', 'warn') + return [Point(i, **kwargs) for i in points] + + @staticmethod + def affine_rank(*args): + """The affine rank of a set of points is the dimension + of the smallest affine space containing all the points. + For example, if the points lie on a line (and are not all + the same) their affine rank is 1. If the points lie on a plane + but not a line, their affine rank is 2. By convention, the empty + set has affine rank -1.""" + + if len(args) == 0: + return -1 + # make sure we're genuinely points + # and translate every point to the origin + points = Point._normalize_dimension(*[Point(i) for i in args]) + origin = points[0] + points = [i - origin for i in points[1:]] + + m = Matrix([i.args for i in points]) + # XXX fragile -- what is a better way? + return m.rank(iszerofunc = lambda x: + abs(x.n(2)) < 1e-12 if x.is_number else x.is_zero) + + @property + def ambient_dimension(self): + """Number of components this point has.""" + return getattr(self, '_ambient_dimension', len(self)) + + @classmethod + def are_coplanar(cls, *points): + """Return True if there exists a plane in which all the points + lie. A trivial True value is returned if `len(points) < 3` or + all Points are 2-dimensional. + + Parameters + ========== + + A set of points + + Raises + ====== + + ValueError : if less than 3 unique points are given + + Returns + ======= + + boolean + + Examples + ======== + + >>> from sympy import Point3D + >>> p1 = Point3D(1, 2, 2) + >>> p2 = Point3D(2, 7, 2) + >>> p3 = Point3D(0, 0, 2) + >>> p4 = Point3D(1, 1, 2) + >>> Point3D.are_coplanar(p1, p2, p3, p4) + True + >>> p5 = Point3D(0, 1, 3) + >>> Point3D.are_coplanar(p1, p2, p3, p5) + False + + """ + if len(points) <= 1: + return True + + points = cls._normalize_dimension(*[Point(i) for i in points]) + # quick exit if we are in 2D + if points[0].ambient_dimension == 2: + return True + points = list(uniq(points)) + return Point.affine_rank(*points) <= 2 + + def distance(self, other): + """The Euclidean distance between self and another GeometricEntity. + + Returns + ======= + + distance : number or symbolic expression. + + Raises + ====== + + TypeError : if other is not recognized as a GeometricEntity or is a + GeometricEntity for which distance is not defined. + + See Also + ======== + + sympy.geometry.line.Segment.length + sympy.geometry.point.Point.taxicab_distance + + Examples + ======== + + >>> from sympy import Point, Line + >>> p1, p2 = Point(1, 1), Point(4, 5) + >>> l = Line((3, 1), (2, 2)) + >>> p1.distance(p2) + 5 + >>> p1.distance(l) + sqrt(2) + + The computed distance may be symbolic, too: + + >>> from sympy.abc import x, y + >>> p3 = Point(x, y) + >>> p3.distance((0, 0)) + sqrt(x**2 + y**2) + + """ + if not isinstance(other, GeometryEntity): + try: + other = Point(other, dim=self.ambient_dimension) + except TypeError: + raise TypeError("not recognized as a GeometricEntity: %s" % type(other)) + if isinstance(other, Point): + s, p = Point._normalize_dimension(self, Point(other)) + return sqrt(Add(*((a - b)**2 for a, b in zip(s, p)))) + distance = getattr(other, 'distance', None) + if distance is None: + raise TypeError("distance between Point and %s is not defined" % type(other)) + return distance(self) + + def dot(self, p): + """Return dot product of self with another Point.""" + if not is_sequence(p): + p = Point(p) # raise the error via Point + return Add(*(a*b for a, b in zip(self, p))) + + def equals(self, other): + """Returns whether the coordinates of self and other agree.""" + # a point is equal to another point if all its components are equal + if not isinstance(other, Point) or len(self) != len(other): + return False + return all(a.equals(b) for a, b in zip(self, other)) + + def _eval_evalf(self, prec=15, **options): + """Evaluate the coordinates of the point. + + This method will, where possible, create and return a new Point + where the coordinates are evaluated as floating point numbers to + the precision indicated (default=15). + + Parameters + ========== + + prec : int + + Returns + ======= + + point : Point + + Examples + ======== + + >>> from sympy import Point, Rational + >>> p1 = Point(Rational(1, 2), Rational(3, 2)) + >>> p1 + Point2D(1/2, 3/2) + >>> p1.evalf() + Point2D(0.5, 1.5) + + """ + dps = prec_to_dps(prec) + coords = [x.evalf(n=dps, **options) for x in self.args] + return Point(*coords, evaluate=False) + + def intersection(self, other): + """The intersection between this point and another GeometryEntity. + + Parameters + ========== + + other : GeometryEntity or sequence of coordinates + + Returns + ======= + + intersection : list of Points + + Notes + ===== + + The return value will either be an empty list if there is no + intersection, otherwise it will contain this point. + + Examples + ======== + + >>> from sympy import Point + >>> p1, p2, p3 = Point(0, 0), Point(1, 1), Point(0, 0) + >>> p1.intersection(p2) + [] + >>> p1.intersection(p3) + [Point2D(0, 0)] + + """ + if not isinstance(other, GeometryEntity): + other = Point(other) + if isinstance(other, Point): + if self == other: + return [self] + p1, p2 = Point._normalize_dimension(self, other) + if p1 == self and p1 == p2: + return [self] + return [] + return other.intersection(self) + + def is_collinear(self, *args): + """Returns `True` if there exists a line + that contains `self` and `points`. Returns `False` otherwise. + A trivially True value is returned if no points are given. + + Parameters + ========== + + args : sequence of Points + + Returns + ======= + + is_collinear : boolean + + See Also + ======== + + sympy.geometry.line.Line + + Examples + ======== + + >>> from sympy import Point + >>> from sympy.abc import x + >>> p1, p2 = Point(0, 0), Point(1, 1) + >>> p3, p4, p5 = Point(2, 2), Point(x, x), Point(1, 2) + >>> Point.is_collinear(p1, p2, p3, p4) + True + >>> Point.is_collinear(p1, p2, p3, p5) + False + + """ + points = (self,) + args + points = Point._normalize_dimension(*[Point(i) for i in points]) + points = list(uniq(points)) + return Point.affine_rank(*points) <= 1 + + def is_concyclic(self, *args): + """Do `self` and the given sequence of points lie in a circle? + + Returns True if the set of points are concyclic and + False otherwise. A trivial value of True is returned + if there are fewer than 2 other points. + + Parameters + ========== + + args : sequence of Points + + Returns + ======= + + is_concyclic : boolean + + + Examples + ======== + + >>> from sympy import Point + + Define 4 points that are on the unit circle: + + >>> p1, p2, p3, p4 = Point(1, 0), (0, 1), (-1, 0), (0, -1) + + >>> p1.is_concyclic() == p1.is_concyclic(p2, p3, p4) == True + True + + Define a point not on that circle: + + >>> p = Point(1, 1) + + >>> p.is_concyclic(p1, p2, p3) + False + + """ + points = (self,) + args + points = Point._normalize_dimension(*[Point(i) for i in points]) + points = list(uniq(points)) + if not Point.affine_rank(*points) <= 2: + return False + origin = points[0] + points = [p - origin for p in points] + # points are concyclic if they are coplanar and + # there is a point c so that ||p_i-c|| == ||p_j-c|| for all + # i and j. Rearranging this equation gives us the following + # condition: the matrix `mat` must not a pivot in the last + # column. + mat = Matrix([list(i) + [i.dot(i)] for i in points]) + rref, pivots = mat.rref() + if len(origin) not in pivots: + return True + return False + + @property + def is_nonzero(self): + """True if any coordinate is nonzero, False if every coordinate is zero, + and None if it cannot be determined.""" + is_zero = self.is_zero + if is_zero is None: + return None + return not is_zero + + def is_scalar_multiple(self, p): + """Returns whether each coordinate of `self` is a scalar + multiple of the corresponding coordinate in point p. + """ + s, o = Point._normalize_dimension(self, Point(p)) + # 2d points happen a lot, so optimize this function call + if s.ambient_dimension == 2: + (x1, y1), (x2, y2) = s.args, o.args + rv = (x1*y2 - x2*y1).equals(0) + if rv is None: + raise Undecidable(filldedent( + '''Cannot determine if %s is a scalar multiple of + %s''' % (s, o))) + + # if the vectors p1 and p2 are linearly dependent, then they must + # be scalar multiples of each other + m = Matrix([s.args, o.args]) + return m.rank() < 2 + + @property + def is_zero(self): + """True if every coordinate is zero, False if any coordinate is not zero, + and None if it cannot be determined.""" + nonzero = [x.is_nonzero for x in self.args] + if any(nonzero): + return False + if any(x is None for x in nonzero): + return None + return True + + @property + def length(self): + """ + Treating a Point as a Line, this returns 0 for the length of a Point. + + Examples + ======== + + >>> from sympy import Point + >>> p = Point(0, 1) + >>> p.length + 0 + """ + return S.Zero + + def midpoint(self, p): + """The midpoint between self and point p. + + Parameters + ========== + + p : Point + + Returns + ======= + + midpoint : Point + + See Also + ======== + + sympy.geometry.line.Segment.midpoint + + Examples + ======== + + >>> from sympy import Point + >>> p1, p2 = Point(1, 1), Point(13, 5) + >>> p1.midpoint(p2) + Point2D(7, 3) + + """ + s, p = Point._normalize_dimension(self, Point(p)) + return Point([simplify((a + b)*S.Half) for a, b in zip(s, p)]) + + @property + def origin(self): + """A point of all zeros of the same ambient dimension + as the current point""" + return Point([0]*len(self), evaluate=False) + + @property + def orthogonal_direction(self): + """Returns a non-zero point that is orthogonal to the + line containing `self` and the origin. + + Examples + ======== + + >>> from sympy import Line, Point + >>> a = Point(1, 2, 3) + >>> a.orthogonal_direction + Point3D(-2, 1, 0) + >>> b = _ + >>> Line(b, b.origin).is_perpendicular(Line(a, a.origin)) + True + """ + dim = self.ambient_dimension + # if a coordinate is zero, we can put a 1 there and zeros elsewhere + if self[0].is_zero: + return Point([1] + (dim - 1)*[0]) + if self[1].is_zero: + return Point([0,1] + (dim - 2)*[0]) + # if the first two coordinates aren't zero, we can create a non-zero + # orthogonal vector by swapping them, negating one, and padding with zeros + return Point([-self[1], self[0]] + (dim - 2)*[0]) + + @staticmethod + def project(a, b): + """Project the point `a` onto the line between the origin + and point `b` along the normal direction. + + Parameters + ========== + + a : Point + b : Point + + Returns + ======= + + p : Point + + See Also + ======== + + sympy.geometry.line.LinearEntity.projection + + Examples + ======== + + >>> from sympy import Line, Point + >>> a = Point(1, 2) + >>> b = Point(2, 5) + >>> z = a.origin + >>> p = Point.project(a, b) + >>> Line(p, a).is_perpendicular(Line(p, b)) + True + >>> Point.is_collinear(z, p, b) + True + """ + a, b = Point._normalize_dimension(Point(a), Point(b)) + if b.is_zero: + raise ValueError("Cannot project to the zero vector.") + return b*(a.dot(b) / b.dot(b)) + + def taxicab_distance(self, p): + """The Taxicab Distance from self to point p. + + Returns the sum of the horizontal and vertical distances to point p. + + Parameters + ========== + + p : Point + + Returns + ======= + + taxicab_distance : The sum of the horizontal + and vertical distances to point p. + + See Also + ======== + + sympy.geometry.point.Point.distance + + Examples + ======== + + >>> from sympy import Point + >>> p1, p2 = Point(1, 1), Point(4, 5) + >>> p1.taxicab_distance(p2) + 7 + + """ + s, p = Point._normalize_dimension(self, Point(p)) + return Add(*(abs(a - b) for a, b in zip(s, p))) + + def canberra_distance(self, p): + """The Canberra Distance from self to point p. + + Returns the weighted sum of horizontal and vertical distances to + point p. + + Parameters + ========== + + p : Point + + Returns + ======= + + canberra_distance : The weighted sum of horizontal and vertical + distances to point p. The weight used is the sum of absolute values + of the coordinates. + + Examples + ======== + + >>> from sympy import Point + >>> p1, p2 = Point(1, 1), Point(3, 3) + >>> p1.canberra_distance(p2) + 1 + >>> p1, p2 = Point(0, 0), Point(3, 3) + >>> p1.canberra_distance(p2) + 2 + + Raises + ====== + + ValueError when both vectors are zero. + + See Also + ======== + + sympy.geometry.point.Point.distance + + """ + + s, p = Point._normalize_dimension(self, Point(p)) + if self.is_zero and p.is_zero: + raise ValueError("Cannot project to the zero vector.") + return Add(*((abs(a - b)/(abs(a) + abs(b))) for a, b in zip(s, p))) + + @property + def unit(self): + """Return the Point that is in the same direction as `self` + and a distance of 1 from the origin""" + return self / abs(self) + + +class Point2D(Point): + """A point in a 2-dimensional Euclidean space. + + Parameters + ========== + + coords + A sequence of 2 coordinate values. + + Attributes + ========== + + x + y + length + + Raises + ====== + + TypeError + When trying to add or subtract points with different dimensions. + When trying to create a point with more than two dimensions. + When `intersection` is called with object other than a Point. + + See Also + ======== + + sympy.geometry.line.Segment : Connects two Points + + Examples + ======== + + >>> from sympy import Point2D + >>> from sympy.abc import x + >>> Point2D(1, 2) + Point2D(1, 2) + >>> Point2D([1, 2]) + Point2D(1, 2) + >>> Point2D(0, x) + Point2D(0, x) + + Floats are automatically converted to Rational unless the + evaluate flag is False: + + >>> Point2D(0.5, 0.25) + Point2D(1/2, 1/4) + >>> Point2D(0.5, 0.25, evaluate=False) + Point2D(0.5, 0.25) + + """ + + _ambient_dimension = 2 + + def __new__(cls, *args, _nocheck=False, **kwargs): + if not _nocheck: + kwargs['dim'] = 2 + args = Point(*args, **kwargs) + return GeometryEntity.__new__(cls, *args) + + def __contains__(self, item): + return item == self + + @property + def bounds(self): + """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding + rectangle for the geometric figure. + + """ + + return (self.x, self.y, self.x, self.y) + + def rotate(self, angle, pt=None): + """Rotate ``angle`` radians counterclockwise about Point ``pt``. + + See Also + ======== + + translate, scale + + Examples + ======== + + >>> from sympy import Point2D, pi + >>> t = Point2D(1, 0) + >>> t.rotate(pi/2) + Point2D(0, 1) + >>> t.rotate(pi/2, (2, 0)) + Point2D(2, -1) + + """ + c = cos(angle) + s = sin(angle) + + rv = self + if pt is not None: + pt = Point(pt, dim=2) + rv -= pt + x, y = rv.args + rv = Point(c*x - s*y, s*x + c*y) + if pt is not None: + rv += pt + return rv + + def scale(self, x=1, y=1, pt=None): + """Scale the coordinates of the Point by multiplying by + ``x`` and ``y`` after subtracting ``pt`` -- default is (0, 0) -- + and then adding ``pt`` back again (i.e. ``pt`` is the point of + reference for the scaling). + + See Also + ======== + + rotate, translate + + Examples + ======== + + >>> from sympy import Point2D + >>> t = Point2D(1, 1) + >>> t.scale(2) + Point2D(2, 1) + >>> t.scale(2, 2) + Point2D(2, 2) + + """ + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + return Point(self.x*x, self.y*y) + + def transform(self, matrix): + """Return the point after applying the transformation described + by the 3x3 Matrix, ``matrix``. + + See Also + ======== + sympy.geometry.point.Point2D.rotate + sympy.geometry.point.Point2D.scale + sympy.geometry.point.Point2D.translate + """ + if not (matrix.is_Matrix and matrix.shape == (3, 3)): + raise ValueError("matrix must be a 3x3 matrix") + x, y = self.args + return Point(*(Matrix(1, 3, [x, y, 1])*matrix).tolist()[0][:2]) + + def translate(self, x=0, y=0): + """Shift the Point by adding x and y to the coordinates of the Point. + + See Also + ======== + + sympy.geometry.point.Point2D.rotate, scale + + Examples + ======== + + >>> from sympy import Point2D + >>> t = Point2D(0, 1) + >>> t.translate(2) + Point2D(2, 1) + >>> t.translate(2, 2) + Point2D(2, 3) + >>> t + Point2D(2, 2) + Point2D(2, 3) + + """ + return Point(self.x + x, self.y + y) + + @property + def coordinates(self): + """ + Returns the two coordinates of the Point. + + Examples + ======== + + >>> from sympy import Point2D + >>> p = Point2D(0, 1) + >>> p.coordinates + (0, 1) + """ + return self.args + + @property + def x(self): + """ + Returns the X coordinate of the Point. + + Examples + ======== + + >>> from sympy import Point2D + >>> p = Point2D(0, 1) + >>> p.x + 0 + """ + return self.args[0] + + @property + def y(self): + """ + Returns the Y coordinate of the Point. + + Examples + ======== + + >>> from sympy import Point2D + >>> p = Point2D(0, 1) + >>> p.y + 1 + """ + return self.args[1] + +class Point3D(Point): + """A point in a 3-dimensional Euclidean space. + + Parameters + ========== + + coords + A sequence of 3 coordinate values. + + Attributes + ========== + + x + y + z + length + + Raises + ====== + + TypeError + When trying to add or subtract points with different dimensions. + When `intersection` is called with object other than a Point. + + Examples + ======== + + >>> from sympy import Point3D + >>> from sympy.abc import x + >>> Point3D(1, 2, 3) + Point3D(1, 2, 3) + >>> Point3D([1, 2, 3]) + Point3D(1, 2, 3) + >>> Point3D(0, x, 3) + Point3D(0, x, 3) + + Floats are automatically converted to Rational unless the + evaluate flag is False: + + >>> Point3D(0.5, 0.25, 2) + Point3D(1/2, 1/4, 2) + >>> Point3D(0.5, 0.25, 3, evaluate=False) + Point3D(0.5, 0.25, 3) + + """ + + _ambient_dimension = 3 + + def __new__(cls, *args, _nocheck=False, **kwargs): + if not _nocheck: + kwargs['dim'] = 3 + args = Point(*args, **kwargs) + return GeometryEntity.__new__(cls, *args) + + def __contains__(self, item): + return item == self + + @staticmethod + def are_collinear(*points): + """Is a sequence of points collinear? + + Test whether or not a set of points are collinear. Returns True if + the set of points are collinear, or False otherwise. + + Parameters + ========== + + points : sequence of Point + + Returns + ======= + + are_collinear : boolean + + See Also + ======== + + sympy.geometry.line.Line3D + + Examples + ======== + + >>> from sympy import Point3D + >>> from sympy.abc import x + >>> p1, p2 = Point3D(0, 0, 0), Point3D(1, 1, 1) + >>> p3, p4, p5 = Point3D(2, 2, 2), Point3D(x, x, x), Point3D(1, 2, 6) + >>> Point3D.are_collinear(p1, p2, p3, p4) + True + >>> Point3D.are_collinear(p1, p2, p3, p5) + False + """ + return Point.is_collinear(*points) + + def direction_cosine(self, point): + """ + Gives the direction cosine between 2 points + + Parameters + ========== + + p : Point3D + + Returns + ======= + + list + + Examples + ======== + + >>> from sympy import Point3D + >>> p1 = Point3D(1, 2, 3) + >>> p1.direction_cosine(Point3D(2, 3, 5)) + [sqrt(6)/6, sqrt(6)/6, sqrt(6)/3] + """ + a = self.direction_ratio(point) + b = sqrt(Add(*(i**2 for i in a))) + return [(point.x - self.x) / b,(point.y - self.y) / b, + (point.z - self.z) / b] + + def direction_ratio(self, point): + """ + Gives the direction ratio between 2 points + + Parameters + ========== + + p : Point3D + + Returns + ======= + + list + + Examples + ======== + + >>> from sympy import Point3D + >>> p1 = Point3D(1, 2, 3) + >>> p1.direction_ratio(Point3D(2, 3, 5)) + [1, 1, 2] + """ + return [(point.x - self.x),(point.y - self.y),(point.z - self.z)] + + def intersection(self, other): + """The intersection between this point and another GeometryEntity. + + Parameters + ========== + + other : GeometryEntity or sequence of coordinates + + Returns + ======= + + intersection : list of Points + + Notes + ===== + + The return value will either be an empty list if there is no + intersection, otherwise it will contain this point. + + Examples + ======== + + >>> from sympy import Point3D + >>> p1, p2, p3 = Point3D(0, 0, 0), Point3D(1, 1, 1), Point3D(0, 0, 0) + >>> p1.intersection(p2) + [] + >>> p1.intersection(p3) + [Point3D(0, 0, 0)] + + """ + if not isinstance(other, GeometryEntity): + other = Point(other, dim=3) + if isinstance(other, Point3D): + if self == other: + return [self] + return [] + return other.intersection(self) + + def scale(self, x=1, y=1, z=1, pt=None): + """Scale the coordinates of the Point by multiplying by + ``x`` and ``y`` after subtracting ``pt`` -- default is (0, 0) -- + and then adding ``pt`` back again (i.e. ``pt`` is the point of + reference for the scaling). + + See Also + ======== + + translate + + Examples + ======== + + >>> from sympy import Point3D + >>> t = Point3D(1, 1, 1) + >>> t.scale(2) + Point3D(2, 1, 1) + >>> t.scale(2, 2) + Point3D(2, 2, 1) + + """ + if pt: + pt = Point3D(pt) + return self.translate(*(-pt).args).scale(x, y, z).translate(*pt.args) + return Point3D(self.x*x, self.y*y, self.z*z) + + def transform(self, matrix): + """Return the point after applying the transformation described + by the 4x4 Matrix, ``matrix``. + + See Also + ======== + sympy.geometry.point.Point3D.scale + sympy.geometry.point.Point3D.translate + """ + if not (matrix.is_Matrix and matrix.shape == (4, 4)): + raise ValueError("matrix must be a 4x4 matrix") + x, y, z = self.args + m = Transpose(matrix) + return Point3D(*(Matrix(1, 4, [x, y, z, 1])*m).tolist()[0][:3]) + + def translate(self, x=0, y=0, z=0): + """Shift the Point by adding x and y to the coordinates of the Point. + + See Also + ======== + + scale + + Examples + ======== + + >>> from sympy import Point3D + >>> t = Point3D(0, 1, 1) + >>> t.translate(2) + Point3D(2, 1, 1) + >>> t.translate(2, 2) + Point3D(2, 3, 1) + >>> t + Point3D(2, 2, 2) + Point3D(2, 3, 3) + + """ + return Point3D(self.x + x, self.y + y, self.z + z) + + @property + def coordinates(self): + """ + Returns the three coordinates of the Point. + + Examples + ======== + + >>> from sympy import Point3D + >>> p = Point3D(0, 1, 2) + >>> p.coordinates + (0, 1, 2) + """ + return self.args + + @property + def x(self): + """ + Returns the X coordinate of the Point. + + Examples + ======== + + >>> from sympy import Point3D + >>> p = Point3D(0, 1, 3) + >>> p.x + 0 + """ + return self.args[0] + + @property + def y(self): + """ + Returns the Y coordinate of the Point. + + Examples + ======== + + >>> from sympy import Point3D + >>> p = Point3D(0, 1, 2) + >>> p.y + 1 + """ + return self.args[1] + + @property + def z(self): + """ + Returns the Z coordinate of the Point. + + Examples + ======== + + >>> from sympy import Point3D + >>> p = Point3D(0, 1, 1) + >>> p.z + 1 + """ + return self.args[2] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/polygon.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/polygon.py new file mode 100644 index 0000000000000000000000000000000000000000..63031183438e2d228f881fd82e1b0ecca04ec534 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/polygon.py @@ -0,0 +1,2891 @@ +from sympy.core import Expr, S, oo, pi, sympify +from sympy.core.evalf import N +from sympy.core.sorting import default_sort_key, ordered +from sympy.core.symbol import _symbol, Dummy, Symbol +from sympy.functions.elementary.complexes import sign +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import cos, sin, tan +from .ellipse import Circle +from .entity import GeometryEntity, GeometrySet +from .exceptions import GeometryError +from .line import Line, Segment, Ray +from .point import Point +from sympy.logic import And +from sympy.matrices import Matrix +from sympy.simplify.simplify import simplify +from sympy.solvers.solvers import solve +from sympy.utilities.iterables import has_dups, has_variety, uniq, rotate_left, least_rotation +from sympy.utilities.misc import as_int, func_name + +from mpmath.libmp.libmpf import prec_to_dps + +import warnings + + +x, y, T = [Dummy('polygon_dummy', real=True) for i in range(3)] + + +class Polygon(GeometrySet): + """A two-dimensional polygon. + + A simple polygon in space. Can be constructed from a sequence of points + or from a center, radius, number of sides and rotation angle. + + Parameters + ========== + + vertices + A sequence of points. + + n : int, optional + If $> 0$, an n-sided RegularPolygon is created. + Default value is $0$. + + Attributes + ========== + + area + angles + perimeter + vertices + centroid + sides + + Raises + ====== + + GeometryError + If all parameters are not Points. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment, Triangle + + Notes + ===== + + Polygons are treated as closed paths rather than 2D areas so + some calculations can be be negative or positive (e.g., area) + based on the orientation of the points. + + Any consecutive identical points are reduced to a single point + and any points collinear and between two points will be removed + unless they are needed to define an explicit intersection (see examples). + + A Triangle, Segment or Point will be returned when there are 3 or + fewer points provided. + + Examples + ======== + + >>> from sympy import Polygon, pi + >>> p1, p2, p3, p4, p5 = [(0, 0), (1, 0), (5, 1), (0, 1), (3, 0)] + >>> Polygon(p1, p2, p3, p4) + Polygon(Point2D(0, 0), Point2D(1, 0), Point2D(5, 1), Point2D(0, 1)) + >>> Polygon(p1, p2) + Segment2D(Point2D(0, 0), Point2D(1, 0)) + >>> Polygon(p1, p2, p5) + Segment2D(Point2D(0, 0), Point2D(3, 0)) + + The area of a polygon is calculated as positive when vertices are + traversed in a ccw direction. When the sides of a polygon cross the + area will have positive and negative contributions. The following + defines a Z shape where the bottom right connects back to the top + left. + + >>> Polygon((0, 2), (2, 2), (0, 0), (2, 0)).area + 0 + + When the keyword `n` is used to define the number of sides of the + Polygon then a RegularPolygon is created and the other arguments are + interpreted as center, radius and rotation. The unrotated RegularPolygon + will always have a vertex at Point(r, 0) where `r` is the radius of the + circle that circumscribes the RegularPolygon. Its method `spin` can be + used to increment that angle. + + >>> p = Polygon((0,0), 1, n=3) + >>> p + RegularPolygon(Point2D(0, 0), 1, 3, 0) + >>> p.vertices[0] + Point2D(1, 0) + >>> p.args[0] + Point2D(0, 0) + >>> p.spin(pi/2) + >>> p.vertices[0] + Point2D(0, 1) + + """ + + __slots__ = () + + def __new__(cls, *args, n = 0, **kwargs): + if n: + args = list(args) + # return a virtual polygon with n sides + if len(args) == 2: # center, radius + args.append(n) + elif len(args) == 3: # center, radius, rotation + args.insert(2, n) + return RegularPolygon(*args, **kwargs) + + vertices = [Point(a, dim=2, **kwargs) for a in args] + + # remove consecutive duplicates + nodup = [] + for p in vertices: + if nodup and p == nodup[-1]: + continue + nodup.append(p) + if len(nodup) > 1 and nodup[-1] == nodup[0]: + nodup.pop() # last point was same as first + + # remove collinear points + i = -3 + while i < len(nodup) - 3 and len(nodup) > 2: + a, b, c = nodup[i], nodup[i + 1], nodup[i + 2] + if Point.is_collinear(a, b, c): + nodup.pop(i + 1) + if a == c: + nodup.pop(i) + else: + i += 1 + + vertices = list(nodup) + + if len(vertices) > 3: + return GeometryEntity.__new__(cls, *vertices, **kwargs) + elif len(vertices) == 3: + return Triangle(*vertices, **kwargs) + elif len(vertices) == 2: + return Segment(*vertices, **kwargs) + else: + return Point(*vertices, **kwargs) + + @property + def area(self): + """ + The area of the polygon. + + Notes + ===== + + The area calculation can be positive or negative based on the + orientation of the points. If any side of the polygon crosses + any other side, there will be areas having opposite signs. + + See Also + ======== + + sympy.geometry.ellipse.Ellipse.area + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.area + 3 + + In the Z shaped polygon (with the lower right connecting back + to the upper left) the areas cancel out: + + >>> Z = Polygon((0, 1), (1, 1), (0, 0), (1, 0)) + >>> Z.area + 0 + + In the M shaped polygon, areas do not cancel because no side + crosses any other (though there is a point of contact). + + >>> M = Polygon((0, 0), (0, 1), (2, 0), (3, 1), (3, 0)) + >>> M.area + -3/2 + + """ + area = 0 + args = self.args + for i in range(len(args)): + x1, y1 = args[i - 1].args + x2, y2 = args[i].args + area += x1*y2 - x2*y1 + return simplify(area) / 2 + + @staticmethod + def _is_clockwise(a, b, c): + """Return True/False for cw/ccw orientation. + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> a, b, c = [Point(i) for i in [(0, 0), (1, 1), (1, 0)]] + >>> Polygon._is_clockwise(a, b, c) + True + >>> Polygon._is_clockwise(a, c, b) + False + """ + ba = b - a + ca = c - a + t_area = simplify(ba.x*ca.y - ca.x*ba.y) + res = t_area.is_nonpositive + if res is None: + raise ValueError("Can't determine orientation") + return res + + @property + def angles(self): + """The internal angle at each vertex. + + Returns + ======= + + angles : dict + A dictionary where each key is a vertex and each value is the + internal angle at that vertex. The vertices are represented as + Points. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.LinearEntity.angle_between + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.angles[p1] + pi/2 + >>> poly.angles[p2] + acos(-4*sqrt(17)/17) + + """ + + args = self.vertices + n = len(args) + ret = {} + for i in range(n): + a, b, c = args[i - 2], args[i - 1], args[i] + reflex_ang = Ray(b, a).angle_between(Ray(b, c)) + if self._is_clockwise(a, b, c): + ret[b] = 2*S.Pi - reflex_ang + else: + ret[b] = reflex_ang + + # internal sum should be pi*(n - 2), not pi*(n+2) + # so if ratio is (n+2)/(n-2) > 1 it is wrong + wrong = ((sum(ret.values())/S.Pi-1)/(n - 2) - 1).is_positive + if wrong: + two_pi = 2*S.Pi + for b in ret: + ret[b] = two_pi - ret[b] + elif wrong is None: + raise ValueError("could not determine Polygon orientation.") + return ret + + @property + def ambient_dimension(self): + return self.vertices[0].ambient_dimension + + @property + def perimeter(self): + """The perimeter of the polygon. + + Returns + ======= + + perimeter : number or Basic instance + + See Also + ======== + + sympy.geometry.line.Segment.length + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.perimeter + sqrt(17) + 7 + """ + p = 0 + args = self.vertices + for i in range(len(args)): + p += args[i - 1].distance(args[i]) + return simplify(p) + + @property + def vertices(self): + """The vertices of the polygon. + + Returns + ======= + + vertices : list of Points + + Notes + ===== + + When iterating over the vertices, it is more efficient to index self + rather than to request the vertices and index them. Only use the + vertices when you want to process all of them at once. This is even + more important with RegularPolygons that calculate each vertex. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.vertices + [Point2D(0, 0), Point2D(1, 0), Point2D(5, 1), Point2D(0, 1)] + >>> poly.vertices[0] + Point2D(0, 0) + + """ + return list(self.args) + + @property + def centroid(self): + """The centroid of the polygon. + + Returns + ======= + + centroid : Point + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.util.centroid + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.centroid + Point2D(31/18, 11/18) + + """ + A = 1/(6*self.area) + cx, cy = 0, 0 + args = self.args + for i in range(len(args)): + x1, y1 = args[i - 1].args + x2, y2 = args[i].args + v = x1*y2 - x2*y1 + cx += v*(x1 + x2) + cy += v*(y1 + y2) + return Point(simplify(A*cx), simplify(A*cy)) + + + def second_moment_of_area(self, point=None): + """Returns the second moment and product moment of area of a two dimensional polygon. + + Parameters + ========== + + point : Point, two-tuple of sympifyable objects, or None(default=None) + point is the point about which second moment of area is to be found. + If "point=None" it will be calculated about the axis passing through the + centroid of the polygon. + + Returns + ======= + + I_xx, I_yy, I_xy : number or SymPy expression + I_xx, I_yy are second moment of area of a two dimensional polygon. + I_xy is product moment of area of a two dimensional polygon. + + Examples + ======== + + >>> from sympy import Polygon, symbols + >>> a, b = symbols('a, b') + >>> p1, p2, p3, p4, p5 = [(0, 0), (a, 0), (a, b), (0, b), (a/3, b/3)] + >>> rectangle = Polygon(p1, p2, p3, p4) + >>> rectangle.second_moment_of_area() + (a*b**3/12, a**3*b/12, 0) + >>> rectangle.second_moment_of_area(p5) + (a*b**3/9, a**3*b/9, a**2*b**2/36) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Second_moment_of_area + + """ + + I_xx, I_yy, I_xy = 0, 0, 0 + args = self.vertices + for i in range(len(args)): + x1, y1 = args[i-1].args + x2, y2 = args[i].args + v = x1*y2 - x2*y1 + I_xx += (y1**2 + y1*y2 + y2**2)*v + I_yy += (x1**2 + x1*x2 + x2**2)*v + I_xy += (x1*y2 + 2*x1*y1 + 2*x2*y2 + x2*y1)*v + A = self.area + c_x = self.centroid[0] + c_y = self.centroid[1] + # parallel axis theorem + I_xx_c = (I_xx/12) - (A*(c_y**2)) + I_yy_c = (I_yy/12) - (A*(c_x**2)) + I_xy_c = (I_xy/24) - (A*(c_x*c_y)) + if point is None: + return I_xx_c, I_yy_c, I_xy_c + + I_xx = (I_xx_c + A*((point[1]-c_y)**2)) + I_yy = (I_yy_c + A*((point[0]-c_x)**2)) + I_xy = (I_xy_c + A*((point[0]-c_x)*(point[1]-c_y))) + + return I_xx, I_yy, I_xy + + + def first_moment_of_area(self, point=None): + """ + Returns the first moment of area of a two-dimensional polygon with + respect to a certain point of interest. + + First moment of area is a measure of the distribution of the area + of a polygon in relation to an axis. The first moment of area of + the entire polygon about its own centroid is always zero. Therefore, + here it is calculated for an area, above or below a certain point + of interest, that makes up a smaller portion of the polygon. This + area is bounded by the point of interest and the extreme end + (top or bottom) of the polygon. The first moment for this area is + is then determined about the centroidal axis of the initial polygon. + + References + ========== + + .. [1] https://skyciv.com/docs/tutorials/section-tutorials/calculating-the-statical-or-first-moment-of-area-of-beam-sections/?cc=BMD + .. [2] https://mechanicalc.com/reference/cross-sections + + Parameters + ========== + + point: Point, two-tuple of sympifyable objects, or None (default=None) + point is the point above or below which the area of interest lies + If ``point=None`` then the centroid acts as the point of interest. + + Returns + ======= + + Q_x, Q_y: number or SymPy expressions + Q_x is the first moment of area about the x-axis + Q_y is the first moment of area about the y-axis + A negative sign indicates that the section modulus is + determined for a section below (or left of) the centroidal axis + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> a, b = 50, 10 + >>> p1, p2, p3, p4 = [(0, b), (0, 0), (a, 0), (a, b)] + >>> p = Polygon(p1, p2, p3, p4) + >>> p.first_moment_of_area() + (625, 3125) + >>> p.first_moment_of_area(point=Point(30, 7)) + (525, 3000) + """ + if point: + xc, yc = self.centroid + else: + point = self.centroid + xc, yc = point + + h_line = Line(point, slope=0) + v_line = Line(point, slope=S.Infinity) + + h_poly = self.cut_section(h_line) + v_poly = self.cut_section(v_line) + + poly_1 = h_poly[0] if h_poly[0].area <= h_poly[1].area else h_poly[1] + poly_2 = v_poly[0] if v_poly[0].area <= v_poly[1].area else v_poly[1] + + Q_x = (poly_1.centroid.y - yc)*poly_1.area + Q_y = (poly_2.centroid.x - xc)*poly_2.area + + return Q_x, Q_y + + + def polar_second_moment_of_area(self): + """Returns the polar modulus of a two-dimensional polygon + + It is a constituent of the second moment of area, linked through + the perpendicular axis theorem. While the planar second moment of + area describes an object's resistance to deflection (bending) when + subjected to a force applied to a plane parallel to the central + axis, the polar second moment of area describes an object's + resistance to deflection when subjected to a moment applied in a + plane perpendicular to the object's central axis (i.e. parallel to + the cross-section) + + Examples + ======== + + >>> from sympy import Polygon, symbols + >>> a, b = symbols('a, b') + >>> rectangle = Polygon((0, 0), (a, 0), (a, b), (0, b)) + >>> rectangle.polar_second_moment_of_area() + a**3*b/12 + a*b**3/12 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Polar_moment_of_inertia + + """ + second_moment = self.second_moment_of_area() + return second_moment[0] + second_moment[1] + + + def section_modulus(self, point=None): + """Returns a tuple with the section modulus of a two-dimensional + polygon. + + Section modulus is a geometric property of a polygon defined as the + ratio of second moment of area to the distance of the extreme end of + the polygon from the centroidal axis. + + Parameters + ========== + + point : Point, two-tuple of sympifyable objects, or None(default=None) + point is the point at which section modulus is to be found. + If "point=None" it will be calculated for the point farthest from the + centroidal axis of the polygon. + + Returns + ======= + + S_x, S_y: numbers or SymPy expressions + S_x is the section modulus with respect to the x-axis + S_y is the section modulus with respect to the y-axis + A negative sign indicates that the section modulus is + determined for a point below the centroidal axis + + Examples + ======== + + >>> from sympy import symbols, Polygon, Point + >>> a, b = symbols('a, b', positive=True) + >>> rectangle = Polygon((0, 0), (a, 0), (a, b), (0, b)) + >>> rectangle.section_modulus() + (a*b**2/6, a**2*b/6) + >>> rectangle.section_modulus(Point(a/4, b/4)) + (-a*b**2/3, -a**2*b/3) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Section_modulus + + """ + x_c, y_c = self.centroid + if point is None: + # taking x and y as maximum distances from centroid + x_min, y_min, x_max, y_max = self.bounds + y = max(y_c - y_min, y_max - y_c) + x = max(x_c - x_min, x_max - x_c) + else: + # taking x and y as distances of the given point from the centroid + y = point.y - y_c + x = point.x - x_c + + second_moment= self.second_moment_of_area() + S_x = second_moment[0]/y + S_y = second_moment[1]/x + + return S_x, S_y + + + @property + def sides(self): + """The directed line segments that form the sides of the polygon. + + Returns + ======= + + sides : list of sides + Each side is a directed Segment. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.sides + [Segment2D(Point2D(0, 0), Point2D(1, 0)), + Segment2D(Point2D(1, 0), Point2D(5, 1)), + Segment2D(Point2D(5, 1), Point2D(0, 1)), Segment2D(Point2D(0, 1), Point2D(0, 0))] + + """ + res = [] + args = self.vertices + for i in range(-len(args), 0): + res.append(Segment(args[i], args[i + 1])) + return res + + @property + def bounds(self): + """Return a tuple (xmin, ymin, xmax, ymax) representing the bounding + rectangle for the geometric figure. + + """ + + verts = self.vertices + xs = [p.x for p in verts] + ys = [p.y for p in verts] + return (min(xs), min(ys), max(xs), max(ys)) + + def is_convex(self): + """Is the polygon convex? + + A polygon is convex if all its interior angles are less than 180 + degrees and there are no intersections between sides. + + Returns + ======= + + is_convex : boolean + True if this polygon is convex, False otherwise. + + See Also + ======== + + sympy.geometry.util.convex_hull + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly = Polygon(p1, p2, p3, p4) + >>> poly.is_convex() + True + + """ + # Determine orientation of points + args = self.vertices + cw = self._is_clockwise(args[-2], args[-1], args[0]) + for i in range(1, len(args)): + if cw ^ self._is_clockwise(args[i - 2], args[i - 1], args[i]): + return False + # check for intersecting sides + sides = self.sides + for i, si in enumerate(sides): + pts = si.args + # exclude the sides connected to si + for j in range(1 if i == len(sides) - 1 else 0, i - 1): + sj = sides[j] + if sj.p1 not in pts and sj.p2 not in pts: + hit = si.intersection(sj) + if hit: + return False + return True + + def encloses_point(self, p): + """ + Return True if p is enclosed by (is inside of) self. + + Notes + ===== + + Being on the border of self is considered False. + + Parameters + ========== + + p : Point + + Returns + ======= + + encloses_point : True, False or None + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.ellipse.Ellipse.encloses_point + + Examples + ======== + + >>> from sympy import Polygon, Point + >>> p = Polygon((0, 0), (4, 0), (4, 4)) + >>> p.encloses_point(Point(2, 1)) + True + >>> p.encloses_point(Point(2, 2)) + False + >>> p.encloses_point(Point(5, 5)) + False + + References + ========== + + .. [1] https://paulbourke.net/geometry/polygonmesh/#insidepoly + + """ + p = Point(p, dim=2) + if p in self.vertices or any(p in s for s in self.sides): + return False + + # move to p, checking that the result is numeric + lit = [] + for v in self.vertices: + lit.append(v - p) # the difference is simplified + if lit[-1].free_symbols: + return None + + poly = Polygon(*lit) + + # polygon closure is assumed in the following test but Polygon removes duplicate pts so + # the last point has to be added so all sides are computed. Using Polygon.sides is + # not good since Segments are unordered. + args = poly.args + indices = list(range(-len(args), 1)) + + if poly.is_convex(): + orientation = None + for i in indices: + a = args[i] + b = args[i + 1] + test = ((-a.y)*(b.x - a.x) - (-a.x)*(b.y - a.y)).is_negative + if orientation is None: + orientation = test + elif test is not orientation: + return False + return True + + hit_odd = False + p1x, p1y = args[0].args + for i in indices[1:]: + p2x, p2y = args[i].args + if 0 > min(p1y, p2y): + if 0 <= max(p1y, p2y): + if 0 <= max(p1x, p2x): + if p1y != p2y: + xinters = (-p1y)*(p2x - p1x)/(p2y - p1y) + p1x + if p1x == p2x or 0 <= xinters: + hit_odd = not hit_odd + p1x, p1y = p2x, p2y + return hit_odd + + def arbitrary_point(self, parameter='t'): + """A parameterized point on the polygon. + + The parameter, varying from 0 to 1, assigns points to the position on + the perimeter that is that fraction of the total perimeter. So the + point evaluated at t=1/2 would return the point from the first vertex + that is 1/2 way around the polygon. + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + arbitrary_point : Point + + Raises + ====== + + ValueError + When `parameter` already appears in the Polygon's definition. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Polygon, Symbol + >>> t = Symbol('t', real=True) + >>> tri = Polygon((0, 0), (1, 0), (1, 1)) + >>> p = tri.arbitrary_point('t') + >>> perimeter = tri.perimeter + >>> s1, s2 = [s.length for s in tri.sides[:2]] + >>> p.subs(t, (s1 + s2/2)/perimeter) + Point2D(1, 1/2) + + """ + t = _symbol(parameter, real=True) + if t.name in (f.name for f in self.free_symbols): + raise ValueError('Symbol %s already appears in object and cannot be used as a parameter.' % t.name) + sides = [] + perimeter = self.perimeter + perim_fraction_start = 0 + for s in self.sides: + side_perim_fraction = s.length/perimeter + perim_fraction_end = perim_fraction_start + side_perim_fraction + pt = s.arbitrary_point(parameter).subs( + t, (t - perim_fraction_start)/side_perim_fraction) + sides.append( + (pt, (And(perim_fraction_start <= t, t < perim_fraction_end)))) + perim_fraction_start = perim_fraction_end + return Piecewise(*sides) + + def parameter_value(self, other, t): + if not isinstance(other,GeometryEntity): + other = Point(other, dim=self.ambient_dimension) + if not isinstance(other,Point): + raise ValueError("other must be a point") + if other.free_symbols: + raise NotImplementedError('non-numeric coordinates') + unknown = False + p = self.arbitrary_point(T) + for pt, cond in p.args: + sol = solve(pt - other, T, dict=True) + if not sol: + continue + value = sol[0][T] + if simplify(cond.subs(T, value)) == True: + return {t: value} + unknown = True + if unknown: + raise ValueError("Given point may not be on %s" % func_name(self)) + raise ValueError("Given point is not on %s" % func_name(self)) + + def plot_interval(self, parameter='t'): + """The plot interval for the default geometric plot of the polygon. + + Parameters + ========== + + parameter : str, optional + Default value is 't'. + + Returns + ======= + + plot_interval : list (plot interval) + [parameter, lower_bound, upper_bound] + + Examples + ======== + + >>> from sympy import Polygon + >>> p = Polygon((0, 0), (1, 0), (1, 1)) + >>> p.plot_interval() + [t, 0, 1] + + """ + t = Symbol(parameter, real=True) + return [t, 0, 1] + + def intersection(self, o): + """The intersection of polygon and geometry entity. + + The intersection may be empty and can contain individual Points and + complete Line Segments. + + Parameters + ========== + + other: GeometryEntity + + Returns + ======= + + intersection : list + The list of Segments and Points + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment + + Examples + ======== + + >>> from sympy import Point, Polygon, Line + >>> p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + >>> poly1 = Polygon(p1, p2, p3, p4) + >>> p5, p6, p7 = map(Point, [(3, 2), (1, -1), (0, 2)]) + >>> poly2 = Polygon(p5, p6, p7) + >>> poly1.intersection(poly2) + [Point2D(1/3, 1), Point2D(2/3, 0), Point2D(9/5, 1/5), Point2D(7/3, 1)] + >>> poly1.intersection(Line(p1, p2)) + [Segment2D(Point2D(0, 0), Point2D(1, 0))] + >>> poly1.intersection(p1) + [Point2D(0, 0)] + """ + intersection_result = [] + k = o.sides if isinstance(o, Polygon) else [o] + for side in self.sides: + for side1 in k: + intersection_result.extend(side.intersection(side1)) + + intersection_result = list(uniq(intersection_result)) + points = [entity for entity in intersection_result if isinstance(entity, Point)] + segments = [entity for entity in intersection_result if isinstance(entity, Segment)] + + if points and segments: + points_in_segments = list(uniq([point for point in points for segment in segments if point in segment])) + if points_in_segments: + for i in points_in_segments: + points.remove(i) + return list(ordered(segments + points)) + else: + return list(ordered(intersection_result)) + + + def cut_section(self, line): + """ + Returns a tuple of two polygon segments that lie above and below + the intersecting line respectively. + + Parameters + ========== + + line: Line object of geometry module + line which cuts the Polygon. The part of the Polygon that lies + above and below this line is returned. + + Returns + ======= + + upper_polygon, lower_polygon: Polygon objects or None + upper_polygon is the polygon that lies above the given line. + lower_polygon is the polygon that lies below the given line. + upper_polygon and lower polygon are ``None`` when no polygon + exists above the line or below the line. + + Raises + ====== + + ValueError: When the line does not intersect the polygon + + Examples + ======== + + >>> from sympy import Polygon, Line + >>> a, b = 20, 10 + >>> p1, p2, p3, p4 = [(0, b), (0, 0), (a, 0), (a, b)] + >>> rectangle = Polygon(p1, p2, p3, p4) + >>> t = rectangle.cut_section(Line((0, 5), slope=0)) + >>> t + (Polygon(Point2D(0, 10), Point2D(0, 5), Point2D(20, 5), Point2D(20, 10)), + Polygon(Point2D(0, 5), Point2D(0, 0), Point2D(20, 0), Point2D(20, 5))) + >>> upper_segment, lower_segment = t + >>> upper_segment.area + 100 + >>> upper_segment.centroid + Point2D(10, 15/2) + >>> lower_segment.centroid + Point2D(10, 5/2) + + References + ========== + + .. [1] https://github.com/sympy/sympy/wiki/A-method-to-return-a-cut-section-of-any-polygon-geometry + + """ + intersection_points = self.intersection(line) + if not intersection_points: + raise ValueError("This line does not intersect the polygon") + + points = list(self.vertices) + points.append(points[0]) + + eq = line.equation(x, y) + + # considering equation of line to be `ax +by + c` + a = eq.coeff(x) + b = eq.coeff(y) + + upper_vertices = [] + lower_vertices = [] + # prev is true when previous point is above the line + prev = True + prev_point = None + for point in points: + # when coefficient of y is 0, right side of the line is + # considered + compare = eq.subs({x: point.x, y: point.y})/b if b \ + else eq.subs(x, point.x)/a + + # if point lies above line + if compare > 0: + if not prev: + # if previous point lies below the line, the intersection + # point of the polygon edge and the line has to be included + edge = Line(point, prev_point) + new_point = edge.intersection(line) + upper_vertices.append(new_point[0]) + lower_vertices.append(new_point[0]) + + upper_vertices.append(point) + prev = True + else: + if prev and prev_point: + edge = Line(point, prev_point) + new_point = edge.intersection(line) + upper_vertices.append(new_point[0]) + lower_vertices.append(new_point[0]) + lower_vertices.append(point) + prev = False + prev_point = point + + upper_polygon, lower_polygon = None, None + if upper_vertices and isinstance(Polygon(*upper_vertices), Polygon): + upper_polygon = Polygon(*upper_vertices) + if lower_vertices and isinstance(Polygon(*lower_vertices), Polygon): + lower_polygon = Polygon(*lower_vertices) + + return upper_polygon, lower_polygon + + + def distance(self, o): + """ + Returns the shortest distance between self and o. + + If o is a point, then self does not need to be convex. + If o is another polygon self and o must be convex. + + Examples + ======== + + >>> from sympy import Point, Polygon, RegularPolygon + >>> p1, p2 = map(Point, [(0, 0), (7, 5)]) + >>> poly = Polygon(*RegularPolygon(p1, 1, 3).vertices) + >>> poly.distance(p2) + sqrt(61) + """ + if isinstance(o, Point): + dist = oo + for side in self.sides: + current = side.distance(o) + if current == 0: + return S.Zero + elif current < dist: + dist = current + return dist + elif isinstance(o, Polygon) and self.is_convex() and o.is_convex(): + return self._do_poly_distance(o) + raise NotImplementedError() + + def _do_poly_distance(self, e2): + """ + Calculates the least distance between the exteriors of two + convex polygons e1 and e2. Does not check for the convexity + of the polygons as this is checked by Polygon.distance. + + Notes + ===== + + - Prints a warning if the two polygons possibly intersect as the return + value will not be valid in such a case. For a more through test of + intersection use intersection(). + + See Also + ======== + + sympy.geometry.point.Point.distance + + Examples + ======== + + >>> from sympy import Point, Polygon + >>> square = Polygon(Point(0, 0), Point(0, 1), Point(1, 1), Point(1, 0)) + >>> triangle = Polygon(Point(1, 2), Point(2, 2), Point(2, 1)) + >>> square._do_poly_distance(triangle) + sqrt(2)/2 + + Description of method used + ========================== + + Method: + [1] https://web.archive.org/web/20150509035744/http://cgm.cs.mcgill.ca/~orm/mind2p.html + Uses rotating calipers: + [2] https://en.wikipedia.org/wiki/Rotating_calipers + and antipodal points: + [3] https://en.wikipedia.org/wiki/Antipodal_point + """ + e1 = self + + '''Tests for a possible intersection between the polygons and outputs a warning''' + e1_center = e1.centroid + e2_center = e2.centroid + e1_max_radius = S.Zero + e2_max_radius = S.Zero + for vertex in e1.vertices: + r = Point.distance(e1_center, vertex) + if e1_max_radius < r: + e1_max_radius = r + for vertex in e2.vertices: + r = Point.distance(e2_center, vertex) + if e2_max_radius < r: + e2_max_radius = r + center_dist = Point.distance(e1_center, e2_center) + if center_dist <= e1_max_radius + e2_max_radius: + warnings.warn("Polygons may intersect producing erroneous output", + stacklevel=3) + + ''' + Find the upper rightmost vertex of e1 and the lowest leftmost vertex of e2 + ''' + e1_ymax = Point(0, -oo) + e2_ymin = Point(0, oo) + + for vertex in e1.vertices: + if vertex.y > e1_ymax.y or (vertex.y == e1_ymax.y and vertex.x > e1_ymax.x): + e1_ymax = vertex + for vertex in e2.vertices: + if vertex.y < e2_ymin.y or (vertex.y == e2_ymin.y and vertex.x < e2_ymin.x): + e2_ymin = vertex + min_dist = Point.distance(e1_ymax, e2_ymin) + + ''' + Produce a dictionary with vertices of e1 as the keys and, for each vertex, the points + to which the vertex is connected as its value. The same is then done for e2. + ''' + e1_connections = {} + e2_connections = {} + + for side in e1.sides: + if side.p1 in e1_connections: + e1_connections[side.p1].append(side.p2) + else: + e1_connections[side.p1] = [side.p2] + + if side.p2 in e1_connections: + e1_connections[side.p2].append(side.p1) + else: + e1_connections[side.p2] = [side.p1] + + for side in e2.sides: + if side.p1 in e2_connections: + e2_connections[side.p1].append(side.p2) + else: + e2_connections[side.p1] = [side.p2] + + if side.p2 in e2_connections: + e2_connections[side.p2].append(side.p1) + else: + e2_connections[side.p2] = [side.p1] + + e1_current = e1_ymax + e2_current = e2_ymin + support_line = Line(Point(S.Zero, S.Zero), Point(S.One, S.Zero)) + + ''' + Determine which point in e1 and e2 will be selected after e2_ymin and e1_ymax, + this information combined with the above produced dictionaries determines the + path that will be taken around the polygons + ''' + point1 = e1_connections[e1_ymax][0] + point2 = e1_connections[e1_ymax][1] + angle1 = support_line.angle_between(Line(e1_ymax, point1)) + angle2 = support_line.angle_between(Line(e1_ymax, point2)) + if angle1 < angle2: + e1_next = point1 + elif angle2 < angle1: + e1_next = point2 + elif Point.distance(e1_ymax, point1) > Point.distance(e1_ymax, point2): + e1_next = point2 + else: + e1_next = point1 + + point1 = e2_connections[e2_ymin][0] + point2 = e2_connections[e2_ymin][1] + angle1 = support_line.angle_between(Line(e2_ymin, point1)) + angle2 = support_line.angle_between(Line(e2_ymin, point2)) + if angle1 > angle2: + e2_next = point1 + elif angle2 > angle1: + e2_next = point2 + elif Point.distance(e2_ymin, point1) > Point.distance(e2_ymin, point2): + e2_next = point2 + else: + e2_next = point1 + + ''' + Loop which determines the distance between anti-podal pairs and updates the + minimum distance accordingly. It repeats until it reaches the starting position. + ''' + while True: + e1_angle = support_line.angle_between(Line(e1_current, e1_next)) + e2_angle = pi - support_line.angle_between(Line( + e2_current, e2_next)) + + if (e1_angle < e2_angle) is True: + support_line = Line(e1_current, e1_next) + e1_segment = Segment(e1_current, e1_next) + min_dist_current = e1_segment.distance(e2_current) + + if min_dist_current.evalf() < min_dist.evalf(): + min_dist = min_dist_current + + if e1_connections[e1_next][0] != e1_current: + e1_current = e1_next + e1_next = e1_connections[e1_next][0] + else: + e1_current = e1_next + e1_next = e1_connections[e1_next][1] + elif (e1_angle > e2_angle) is True: + support_line = Line(e2_next, e2_current) + e2_segment = Segment(e2_current, e2_next) + min_dist_current = e2_segment.distance(e1_current) + + if min_dist_current.evalf() < min_dist.evalf(): + min_dist = min_dist_current + + if e2_connections[e2_next][0] != e2_current: + e2_current = e2_next + e2_next = e2_connections[e2_next][0] + else: + e2_current = e2_next + e2_next = e2_connections[e2_next][1] + else: + support_line = Line(e1_current, e1_next) + e1_segment = Segment(e1_current, e1_next) + e2_segment = Segment(e2_current, e2_next) + min1 = e1_segment.distance(e2_next) + min2 = e2_segment.distance(e1_next) + + min_dist_current = min(min1, min2) + if min_dist_current.evalf() < min_dist.evalf(): + min_dist = min_dist_current + + if e1_connections[e1_next][0] != e1_current: + e1_current = e1_next + e1_next = e1_connections[e1_next][0] + else: + e1_current = e1_next + e1_next = e1_connections[e1_next][1] + + if e2_connections[e2_next][0] != e2_current: + e2_current = e2_next + e2_next = e2_connections[e2_next][0] + else: + e2_current = e2_next + e2_next = e2_connections[e2_next][1] + if e1_current == e1_ymax and e2_current == e2_ymin: + break + return min_dist + + def _svg(self, scale_factor=1., fill_color="#66cc99"): + """Returns SVG path element for the Polygon. + + Parameters + ========== + + scale_factor : float + Multiplication factor for the SVG stroke-width. Default is 1. + fill_color : str, optional + Hex string for fill color. Default is "#66cc99". + """ + verts = map(N, self.vertices) + coords = ["{},{}".format(p.x, p.y) for p in verts] + path = "M {} L {} z".format(coords[0], " L ".join(coords[1:])) + return ( + '' + ).format(2. * scale_factor, path, fill_color) + + def _hashable_content(self): + + D = {} + def ref_list(point_list): + kee = {} + for i, p in enumerate(ordered(set(point_list))): + kee[p] = i + D[i] = p + return [kee[p] for p in point_list] + + S1 = ref_list(self.args) + r_nor = rotate_left(S1, least_rotation(S1)) + S2 = ref_list(list(reversed(self.args))) + r_rev = rotate_left(S2, least_rotation(S2)) + if r_nor < r_rev: + r = r_nor + else: + r = r_rev + canonical_args = [ D[order] for order in r ] + return tuple(canonical_args) + + def __contains__(self, o): + """ + Return True if o is contained within the boundary lines of self.altitudes + + Parameters + ========== + + other : GeometryEntity + + Returns + ======= + + contained in : bool + The points (and sides, if applicable) are contained in self. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity.encloses + + Examples + ======== + + >>> from sympy import Line, Segment, Point + >>> p = Point(0, 0) + >>> q = Point(1, 1) + >>> s = Segment(p, q*2) + >>> l = Line(p, q) + >>> p in q + False + >>> p in s + True + >>> q*3 in s + False + >>> s in l + True + + """ + + if isinstance(o, Polygon): + return self == o + elif isinstance(o, Segment): + return any(o in s for s in self.sides) + elif isinstance(o, Point): + if o in self.vertices: + return True + for side in self.sides: + if o in side: + return True + + return False + + def bisectors(p, prec=None): + """Returns angle bisectors of a polygon. If prec is given + then approximate the point defining the ray to that precision. + + The distance between the points defining the bisector ray is 1. + + Examples + ======== + + >>> from sympy import Polygon, Point + >>> p = Polygon(Point(0, 0), Point(2, 0), Point(1, 1), Point(0, 3)) + >>> p.bisectors(2) + {Point2D(0, 0): Ray2D(Point2D(0, 0), Point2D(0.71, 0.71)), + Point2D(0, 3): Ray2D(Point2D(0, 3), Point2D(0.23, 2.0)), + Point2D(1, 1): Ray2D(Point2D(1, 1), Point2D(0.19, 0.42)), + Point2D(2, 0): Ray2D(Point2D(2, 0), Point2D(1.1, 0.38))} + """ + b = {} + pts = list(p.args) + pts.append(pts[0]) # close it + cw = Polygon._is_clockwise(*pts[:3]) + if cw: + pts = list(reversed(pts)) + for v, a in p.angles.items(): + i = pts.index(v) + p1, p2 = Point._normalize_dimension(pts[i], pts[i + 1]) + ray = Ray(p1, p2).rotate(a/2, v) + dir = ray.direction + ray = Ray(ray.p1, ray.p1 + dir/dir.distance((0, 0))) + if prec is not None: + ray = Ray(ray.p1, ray.p2.n(prec)) + b[v] = ray + return b + + +class RegularPolygon(Polygon): + """ + A regular polygon. + + Such a polygon has all internal angles equal and all sides the same length. + + Parameters + ========== + + center : Point + radius : number or Basic instance + The distance from the center to a vertex + n : int + The number of sides + + Attributes + ========== + + vertices + center + radius + rotation + apothem + interior_angle + exterior_angle + circumcircle + incircle + angles + + Raises + ====== + + GeometryError + If the `center` is not a Point, or the `radius` is not a number or Basic + instance, or the number of sides, `n`, is less than three. + + Notes + ===== + + A RegularPolygon can be instantiated with Polygon with the kwarg n. + + Regular polygons are instantiated with a center, radius, number of sides + and a rotation angle. Whereas the arguments of a Polygon are vertices, the + vertices of the RegularPolygon must be obtained with the vertices method. + + See Also + ======== + + sympy.geometry.point.Point, Polygon + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> r = RegularPolygon(Point(0, 0), 5, 3) + >>> r + RegularPolygon(Point2D(0, 0), 5, 3, 0) + >>> r.vertices[0] + Point2D(5, 0) + + """ + + __slots__ = ('_n', '_center', '_radius', '_rot') + + def __new__(self, c, r, n, rot=0, **kwargs): + r, n, rot = map(sympify, (r, n, rot)) + c = Point(c, dim=2, **kwargs) + if not isinstance(r, Expr): + raise GeometryError("r must be an Expr object, not %s" % r) + if n.is_Number: + as_int(n) # let an error raise if necessary + if n < 3: + raise GeometryError("n must be a >= 3, not %s" % n) + + obj = GeometryEntity.__new__(self, c, r, n, **kwargs) + obj._n = n + obj._center = c + obj._radius = r + obj._rot = rot % (2*S.Pi/n) if rot.is_number else rot + return obj + + def _eval_evalf(self, prec=15, **options): + c, r, n, a = self.args + dps = prec_to_dps(prec) + c, r, a = [i.evalf(n=dps, **options) for i in (c, r, a)] + return self.func(c, r, n, a) + + @property + def args(self): + """ + Returns the center point, the radius, + the number of sides, and the orientation angle. + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> r = RegularPolygon(Point(0, 0), 5, 3) + >>> r.args + (Point2D(0, 0), 5, 3, 0) + """ + return self._center, self._radius, self._n, self._rot + + def __str__(self): + return 'RegularPolygon(%s, %s, %s, %s)' % tuple(self.args) + + def __repr__(self): + return 'RegularPolygon(%s, %s, %s, %s)' % tuple(self.args) + + @property + def area(self): + """Returns the area. + + Examples + ======== + + >>> from sympy import RegularPolygon + >>> square = RegularPolygon((0, 0), 1, 4) + >>> square.area + 2 + >>> _ == square.length**2 + True + """ + c, r, n, rot = self.args + return sign(r)*n*self.length**2/(4*tan(pi/n)) + + @property + def length(self): + """Returns the length of the sides. + + The half-length of the side and the apothem form two legs + of a right triangle whose hypotenuse is the radius of the + regular polygon. + + Examples + ======== + + >>> from sympy import RegularPolygon + >>> from sympy import sqrt + >>> s = square_in_unit_circle = RegularPolygon((0, 0), 1, 4) + >>> s.length + sqrt(2) + >>> sqrt((_/2)**2 + s.apothem**2) == s.radius + True + + """ + return self.radius*2*sin(pi/self._n) + + @property + def center(self): + """The center of the RegularPolygon + + This is also the center of the circumscribing circle. + + Returns + ======= + + center : Point + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.ellipse.Ellipse.center + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 5, 4) + >>> rp.center + Point2D(0, 0) + """ + return self._center + + centroid = center + + @property + def circumcenter(self): + """ + Alias for center. + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 5, 4) + >>> rp.circumcenter + Point2D(0, 0) + """ + return self.center + + @property + def radius(self): + """Radius of the RegularPolygon + + This is also the radius of the circumscribing circle. + + Returns + ======= + + radius : number or instance of Basic + + See Also + ======== + + sympy.geometry.line.Segment.length, sympy.geometry.ellipse.Circle.radius + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy import RegularPolygon, Point + >>> radius = Symbol('r') + >>> rp = RegularPolygon(Point(0, 0), radius, 4) + >>> rp.radius + r + + """ + return self._radius + + @property + def circumradius(self): + """ + Alias for radius. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy import RegularPolygon, Point + >>> radius = Symbol('r') + >>> rp = RegularPolygon(Point(0, 0), radius, 4) + >>> rp.circumradius + r + """ + return self.radius + + @property + def rotation(self): + """CCW angle by which the RegularPolygon is rotated + + Returns + ======= + + rotation : number or instance of Basic + + Examples + ======== + + >>> from sympy import pi + >>> from sympy.abc import a + >>> from sympy import RegularPolygon, Point + >>> RegularPolygon(Point(0, 0), 3, 4, pi/4).rotation + pi/4 + + Numerical rotation angles are made canonical: + + >>> RegularPolygon(Point(0, 0), 3, 4, a).rotation + a + >>> RegularPolygon(Point(0, 0), 3, 4, pi).rotation + 0 + + """ + return self._rot + + @property + def apothem(self): + """The inradius of the RegularPolygon. + + The apothem/inradius is the radius of the inscribed circle. + + Returns + ======= + + apothem : number or instance of Basic + + See Also + ======== + + sympy.geometry.line.Segment.length, sympy.geometry.ellipse.Circle.radius + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy import RegularPolygon, Point + >>> radius = Symbol('r') + >>> rp = RegularPolygon(Point(0, 0), radius, 4) + >>> rp.apothem + sqrt(2)*r/2 + + """ + return self.radius * cos(S.Pi/self._n) + + @property + def inradius(self): + """ + Alias for apothem. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy import RegularPolygon, Point + >>> radius = Symbol('r') + >>> rp = RegularPolygon(Point(0, 0), radius, 4) + >>> rp.inradius + sqrt(2)*r/2 + """ + return self.apothem + + @property + def interior_angle(self): + """Measure of the interior angles. + + Returns + ======= + + interior_angle : number + + See Also + ======== + + sympy.geometry.line.LinearEntity.angle_between + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 4, 8) + >>> rp.interior_angle + 3*pi/4 + + """ + return (self._n - 2)*S.Pi/self._n + + @property + def exterior_angle(self): + """Measure of the exterior angles. + + Returns + ======= + + exterior_angle : number + + See Also + ======== + + sympy.geometry.line.LinearEntity.angle_between + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 4, 8) + >>> rp.exterior_angle + pi/4 + + """ + return 2*S.Pi/self._n + + @property + def circumcircle(self): + """The circumcircle of the RegularPolygon. + + Returns + ======= + + circumcircle : Circle + + See Also + ======== + + circumcenter, sympy.geometry.ellipse.Circle + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 4, 8) + >>> rp.circumcircle + Circle(Point2D(0, 0), 4) + + """ + return Circle(self.center, self.radius) + + @property + def incircle(self): + """The incircle of the RegularPolygon. + + Returns + ======= + + incircle : Circle + + See Also + ======== + + inradius, sympy.geometry.ellipse.Circle + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 4, 7) + >>> rp.incircle + Circle(Point2D(0, 0), 4*cos(pi/7)) + + """ + return Circle(self.center, self.apothem) + + @property + def angles(self): + """ + Returns a dictionary with keys, the vertices of the Polygon, + and values, the interior angle at each vertex. + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> r = RegularPolygon(Point(0, 0), 5, 3) + >>> r.angles + {Point2D(-5/2, -5*sqrt(3)/2): pi/3, + Point2D(-5/2, 5*sqrt(3)/2): pi/3, + Point2D(5, 0): pi/3} + """ + ret = {} + ang = self.interior_angle + for v in self.vertices: + ret[v] = ang + return ret + + def encloses_point(self, p): + """ + Return True if p is enclosed by (is inside of) self. + + Notes + ===== + + Being on the border of self is considered False. + + The general Polygon.encloses_point method is called only if + a point is not within or beyond the incircle or circumcircle, + respectively. + + Parameters + ========== + + p : Point + + Returns + ======= + + encloses_point : True, False or None + + See Also + ======== + + sympy.geometry.ellipse.Ellipse.encloses_point + + Examples + ======== + + >>> from sympy import RegularPolygon, S, Point, Symbol + >>> p = RegularPolygon((0, 0), 3, 4) + >>> p.encloses_point(Point(0, 0)) + True + >>> r, R = p.inradius, p.circumradius + >>> p.encloses_point(Point((r + R)/2, 0)) + True + >>> p.encloses_point(Point(R/2, R/2 + (R - r)/10)) + False + >>> t = Symbol('t', real=True) + >>> p.encloses_point(p.arbitrary_point().subs(t, S.Half)) + False + >>> p.encloses_point(Point(5, 5)) + False + + """ + + c = self.center + d = Segment(c, p).length + if d >= self.radius: + return False + elif d < self.inradius: + return True + else: + # now enumerate the RegularPolygon like a general polygon. + return Polygon.encloses_point(self, p) + + def spin(self, angle): + """Increment *in place* the virtual Polygon's rotation by ccw angle. + + See also: rotate method which moves the center. + + >>> from sympy import Polygon, Point, pi + >>> r = Polygon(Point(0,0), 1, n=3) + >>> r.vertices[0] + Point2D(1, 0) + >>> r.spin(pi/6) + >>> r.vertices[0] + Point2D(sqrt(3)/2, 1/2) + + See Also + ======== + + rotation + rotate : Creates a copy of the RegularPolygon rotated about a Point + + """ + self._rot += angle + + def rotate(self, angle, pt=None): + """Override GeometryEntity.rotate to first rotate the RegularPolygon + about its center. + + >>> from sympy import Point, RegularPolygon, pi + >>> t = RegularPolygon(Point(1, 0), 1, 3) + >>> t.vertices[0] # vertex on x-axis + Point2D(2, 0) + >>> t.rotate(pi/2).vertices[0] # vertex on y axis now + Point2D(0, 2) + + See Also + ======== + + rotation + spin : Rotates a RegularPolygon in place + + """ + + r = type(self)(*self.args) # need a copy or else changes are in-place + r._rot += angle + return GeometryEntity.rotate(r, angle, pt) + + def scale(self, x=1, y=1, pt=None): + """Override GeometryEntity.scale since it is the radius that must be + scaled (if x == y) or else a new Polygon must be returned. + + >>> from sympy import RegularPolygon + + Symmetric scaling returns a RegularPolygon: + + >>> RegularPolygon((0, 0), 1, 4).scale(2, 2) + RegularPolygon(Point2D(0, 0), 2, 4, 0) + + Asymmetric scaling returns a kite as a Polygon: + + >>> RegularPolygon((0, 0), 1, 4).scale(2, 1) + Polygon(Point2D(2, 0), Point2D(0, 1), Point2D(-2, 0), Point2D(0, -1)) + + """ + if pt: + pt = Point(pt, dim=2) + return self.translate(*(-pt).args).scale(x, y).translate(*pt.args) + if x != y: + return Polygon(*self.vertices).scale(x, y) + c, r, n, rot = self.args + r *= x + return self.func(c, r, n, rot) + + def reflect(self, line): + """Override GeometryEntity.reflect since this is not made of only + points. + + Examples + ======== + + >>> from sympy import RegularPolygon, Line + + >>> RegularPolygon((0, 0), 1, 4).reflect(Line((0, 1), slope=-2)) + RegularPolygon(Point2D(4/5, 2/5), -1, 4, atan(4/3)) + + """ + c, r, n, rot = self.args + v = self.vertices[0] + d = v - c + cc = c.reflect(line) + vv = v.reflect(line) + dd = vv - cc + # calculate rotation about the new center + # which will align the vertices + l1 = Ray((0, 0), dd) + l2 = Ray((0, 0), d) + ang = l1.closing_angle(l2) + rot += ang + # change sign of radius as point traversal is reversed + return self.func(cc, -r, n, rot) + + @property + def vertices(self): + """The vertices of the RegularPolygon. + + Returns + ======= + + vertices : list + Each vertex is a Point. + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import RegularPolygon, Point + >>> rp = RegularPolygon(Point(0, 0), 5, 4) + >>> rp.vertices + [Point2D(5, 0), Point2D(0, 5), Point2D(-5, 0), Point2D(0, -5)] + + """ + c = self._center + r = abs(self._radius) + rot = self._rot + v = 2*S.Pi/self._n + + return [Point(c.x + r*cos(k*v + rot), c.y + r*sin(k*v + rot)) + for k in range(self._n)] + + def __eq__(self, o): + if not isinstance(o, Polygon): + return False + elif not isinstance(o, RegularPolygon): + return Polygon.__eq__(o, self) + return self.args == o.args + + def __hash__(self): + return super().__hash__() + + +class Triangle(Polygon): + """ + A polygon with three vertices and three sides. + + Parameters + ========== + + points : sequence of Points + keyword: asa, sas, or sss to specify sides/angles of the triangle + + Attributes + ========== + + vertices + altitudes + orthocenter + circumcenter + circumradius + circumcircle + inradius + incircle + exradii + medians + medial + nine_point_circle + + Raises + ====== + + GeometryError + If the number of vertices is not equal to three, or one of the vertices + is not a Point, or a valid keyword is not given. + + See Also + ======== + + sympy.geometry.point.Point, Polygon + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> Triangle(Point(0, 0), Point(4, 0), Point(4, 3)) + Triangle(Point2D(0, 0), Point2D(4, 0), Point2D(4, 3)) + + Keywords sss, sas, or asa can be used to give the desired + side lengths (in order) and interior angles (in degrees) that + define the triangle: + + >>> Triangle(sss=(3, 4, 5)) + Triangle(Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) + >>> Triangle(asa=(30, 1, 30)) + Triangle(Point2D(0, 0), Point2D(1, 0), Point2D(1/2, sqrt(3)/6)) + >>> Triangle(sas=(1, 45, 2)) + Triangle(Point2D(0, 0), Point2D(2, 0), Point2D(sqrt(2)/2, sqrt(2)/2)) + + """ + + def __new__(cls, *args, **kwargs): + if len(args) != 3: + if 'sss' in kwargs: + return _sss(*[simplify(a) for a in kwargs['sss']]) + if 'asa' in kwargs: + return _asa(*[simplify(a) for a in kwargs['asa']]) + if 'sas' in kwargs: + return _sas(*[simplify(a) for a in kwargs['sas']]) + msg = "Triangle instantiates with three points or a valid keyword." + raise GeometryError(msg) + + vertices = [Point(a, dim=2, **kwargs) for a in args] + + # remove consecutive duplicates + nodup = [] + for p in vertices: + if nodup and p == nodup[-1]: + continue + nodup.append(p) + if len(nodup) > 1 and nodup[-1] == nodup[0]: + nodup.pop() # last point was same as first + + # remove collinear points + i = -3 + while i < len(nodup) - 3 and len(nodup) > 2: + a, b, c = sorted( + [nodup[i], nodup[i + 1], nodup[i + 2]], key=default_sort_key) + if Point.is_collinear(a, b, c): + nodup[i] = a + nodup[i + 1] = None + nodup.pop(i + 1) + i += 1 + + vertices = list(filter(lambda x: x is not None, nodup)) + + if len(vertices) == 3: + return GeometryEntity.__new__(cls, *vertices, **kwargs) + elif len(vertices) == 2: + return Segment(*vertices, **kwargs) + else: + return Point(*vertices, **kwargs) + + @property + def vertices(self): + """The triangle's vertices + + Returns + ======= + + vertices : tuple + Each element in the tuple is a Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t = Triangle(Point(0, 0), Point(4, 0), Point(4, 3)) + >>> t.vertices + (Point2D(0, 0), Point2D(4, 0), Point2D(4, 3)) + + """ + return self.args + + def is_similar(t1, t2): + """Is another triangle similar to this one. + + Two triangles are similar if one can be uniformly scaled to the other. + + Parameters + ========== + + other: Triangle + + Returns + ======= + + is_similar : boolean + + See Also + ======== + + sympy.geometry.entity.GeometryEntity.is_similar + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t1 = Triangle(Point(0, 0), Point(4, 0), Point(4, 3)) + >>> t2 = Triangle(Point(0, 0), Point(-4, 0), Point(-4, -3)) + >>> t1.is_similar(t2) + True + + >>> t2 = Triangle(Point(0, 0), Point(-4, 0), Point(-4, -4)) + >>> t1.is_similar(t2) + False + + """ + if not isinstance(t2, Polygon): + return False + + s1_1, s1_2, s1_3 = [side.length for side in t1.sides] + s2 = [side.length for side in t2.sides] + + def _are_similar(u1, u2, u3, v1, v2, v3): + e1 = simplify(u1/v1) + e2 = simplify(u2/v2) + e3 = simplify(u3/v3) + return bool(e1 == e2) and bool(e2 == e3) + + # There's only 6 permutations, so write them out + return _are_similar(s1_1, s1_2, s1_3, *s2) or \ + _are_similar(s1_1, s1_3, s1_2, *s2) or \ + _are_similar(s1_2, s1_1, s1_3, *s2) or \ + _are_similar(s1_2, s1_3, s1_1, *s2) or \ + _are_similar(s1_3, s1_1, s1_2, *s2) or \ + _are_similar(s1_3, s1_2, s1_1, *s2) + + def is_equilateral(self): + """Are all the sides the same length? + + Returns + ======= + + is_equilateral : boolean + + See Also + ======== + + sympy.geometry.entity.GeometryEntity.is_similar, RegularPolygon + is_isosceles, is_right, is_scalene + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t1 = Triangle(Point(0, 0), Point(4, 0), Point(4, 3)) + >>> t1.is_equilateral() + False + + >>> from sympy import sqrt + >>> t2 = Triangle(Point(0, 0), Point(10, 0), Point(5, 5*sqrt(3))) + >>> t2.is_equilateral() + True + + """ + return not has_variety(s.length for s in self.sides) + + def is_isosceles(self): + """Are two or more of the sides the same length? + + Returns + ======= + + is_isosceles : boolean + + See Also + ======== + + is_equilateral, is_right, is_scalene + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t1 = Triangle(Point(0, 0), Point(4, 0), Point(2, 4)) + >>> t1.is_isosceles() + True + + """ + return has_dups(s.length for s in self.sides) + + def is_scalene(self): + """Are all the sides of the triangle of different lengths? + + Returns + ======= + + is_scalene : boolean + + See Also + ======== + + is_equilateral, is_isosceles, is_right + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t1 = Triangle(Point(0, 0), Point(4, 0), Point(1, 4)) + >>> t1.is_scalene() + True + + """ + return not has_dups(s.length for s in self.sides) + + def is_right(self): + """Is the triangle right-angled. + + Returns + ======= + + is_right : boolean + + See Also + ======== + + sympy.geometry.line.LinearEntity.is_perpendicular + is_equilateral, is_isosceles, is_scalene + + Examples + ======== + + >>> from sympy import Triangle, Point + >>> t1 = Triangle(Point(0, 0), Point(4, 0), Point(4, 3)) + >>> t1.is_right() + True + + """ + s = self.sides + return Segment.is_perpendicular(s[0], s[1]) or \ + Segment.is_perpendicular(s[1], s[2]) or \ + Segment.is_perpendicular(s[0], s[2]) + + @property + def altitudes(self): + """The altitudes of the triangle. + + An altitude of a triangle is a segment through a vertex, + perpendicular to the opposite side, with length being the + height of the vertex measured from the line containing the side. + + Returns + ======= + + altitudes : dict + The dictionary consists of keys which are vertices and values + which are Segments. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment.length + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.altitudes[p1] + Segment2D(Point2D(0, 0), Point2D(1/2, 1/2)) + + """ + s = self.sides + v = self.vertices + return {v[0]: s[1].perpendicular_segment(v[0]), + v[1]: s[2].perpendicular_segment(v[1]), + v[2]: s[0].perpendicular_segment(v[2])} + + @property + def orthocenter(self): + """The orthocenter of the triangle. + + The orthocenter is the intersection of the altitudes of a triangle. + It may lie inside, outside or on the triangle. + + Returns + ======= + + orthocenter : Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.orthocenter + Point2D(0, 0) + + """ + a = self.altitudes + v = self.vertices + return Line(a[v[0]]).intersection(Line(a[v[1]]))[0] + + @property + def circumcenter(self): + """The circumcenter of the triangle + + The circumcenter is the center of the circumcircle. + + Returns + ======= + + circumcenter : Point + + See Also + ======== + + sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.circumcenter + Point2D(1/2, 1/2) + """ + a, b, c = [x.perpendicular_bisector() for x in self.sides] + return a.intersection(b)[0] + + @property + def circumradius(self): + """The radius of the circumcircle of the triangle. + + Returns + ======= + + circumradius : number of Basic instance + + See Also + ======== + + sympy.geometry.ellipse.Circle.radius + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy import Point, Triangle + >>> a = Symbol('a') + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, a) + >>> t = Triangle(p1, p2, p3) + >>> t.circumradius + sqrt(a**2/4 + 1/4) + """ + return Point.distance(self.circumcenter, self.vertices[0]) + + @property + def circumcircle(self): + """The circle which passes through the three vertices of the triangle. + + Returns + ======= + + circumcircle : Circle + + See Also + ======== + + sympy.geometry.ellipse.Circle + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.circumcircle + Circle(Point2D(1/2, 1/2), sqrt(2)/2) + + """ + return Circle(self.circumcenter, self.circumradius) + + def bisectors(self): + """The angle bisectors of the triangle. + + An angle bisector of a triangle is a straight line through a vertex + which cuts the corresponding angle in half. + + Returns + ======= + + bisectors : dict + Each key is a vertex (Point) and each value is the corresponding + bisector (Segment). + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment + + Examples + ======== + + >>> from sympy import Point, Triangle, Segment + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> from sympy import sqrt + >>> t.bisectors()[p2] == Segment(Point(1, 0), Point(0, sqrt(2) - 1)) + True + + """ + # use lines containing sides so containment check during + # intersection calculation can be avoided, thus reducing + # the processing time for calculating the bisectors + s = [Line(l) for l in self.sides] + v = self.vertices + c = self.incenter + l1 = Segment(v[0], Line(v[0], c).intersection(s[1])[0]) + l2 = Segment(v[1], Line(v[1], c).intersection(s[2])[0]) + l3 = Segment(v[2], Line(v[2], c).intersection(s[0])[0]) + return {v[0]: l1, v[1]: l2, v[2]: l3} + + @property + def incenter(self): + """The center of the incircle. + + The incircle is the circle which lies inside the triangle and touches + all three sides. + + Returns + ======= + + incenter : Point + + See Also + ======== + + incircle, sympy.geometry.point.Point + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.incenter + Point2D(1 - sqrt(2)/2, 1 - sqrt(2)/2) + + """ + s = self.sides + l = Matrix([s[i].length for i in [1, 2, 0]]) + p = sum(l) + v = self.vertices + x = simplify(l.dot(Matrix([vi.x for vi in v]))/p) + y = simplify(l.dot(Matrix([vi.y for vi in v]))/p) + return Point(x, y) + + @property + def inradius(self): + """The radius of the incircle. + + Returns + ======= + + inradius : number of Basic instance + + See Also + ======== + + incircle, sympy.geometry.ellipse.Circle.radius + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(4, 0), Point(0, 3) + >>> t = Triangle(p1, p2, p3) + >>> t.inradius + 1 + + """ + return simplify(2 * self.area / self.perimeter) + + @property + def incircle(self): + """The incircle of the triangle. + + The incircle is the circle which lies inside the triangle and touches + all three sides. + + Returns + ======= + + incircle : Circle + + See Also + ======== + + sympy.geometry.ellipse.Circle + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(2, 0), Point(0, 2) + >>> t = Triangle(p1, p2, p3) + >>> t.incircle + Circle(Point2D(2 - sqrt(2), 2 - sqrt(2)), 2 - sqrt(2)) + + """ + return Circle(self.incenter, self.inradius) + + @property + def exradii(self): + """The radius of excircles of a triangle. + + An excircle of the triangle is a circle lying outside the triangle, + tangent to one of its sides and tangent to the extensions of the + other two. + + Returns + ======= + + exradii : dict + + See Also + ======== + + sympy.geometry.polygon.Triangle.inradius + + Examples + ======== + + The exradius touches the side of the triangle to which it is keyed, e.g. + the exradius touching side 2 is: + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(6, 0), Point(0, 2) + >>> t = Triangle(p1, p2, p3) + >>> t.exradii[t.sides[2]] + -2 + sqrt(10) + + References + ========== + + .. [1] https://mathworld.wolfram.com/Exradius.html + .. [2] https://mathworld.wolfram.com/Excircles.html + + """ + + side = self.sides + a = side[0].length + b = side[1].length + c = side[2].length + s = (a+b+c)/2 + area = self.area + exradii = {self.sides[0]: simplify(area/(s-a)), + self.sides[1]: simplify(area/(s-b)), + self.sides[2]: simplify(area/(s-c))} + + return exradii + + @property + def excenters(self): + """Excenters of the triangle. + + An excenter is the center of a circle that is tangent to a side of the + triangle and the extensions of the other two sides. + + Returns + ======= + + excenters : dict + + + Examples + ======== + + The excenters are keyed to the side of the triangle to which their corresponding + excircle is tangent: The center is keyed, e.g. the excenter of a circle touching + side 0 is: + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(6, 0), Point(0, 2) + >>> t = Triangle(p1, p2, p3) + >>> t.excenters[t.sides[0]] + Point2D(12*sqrt(10), 2/3 + sqrt(10)/3) + + See Also + ======== + + sympy.geometry.polygon.Triangle.exradii + + References + ========== + + .. [1] https://mathworld.wolfram.com/Excircles.html + + """ + + s = self.sides + v = self.vertices + a = s[0].length + b = s[1].length + c = s[2].length + x = [v[0].x, v[1].x, v[2].x] + y = [v[0].y, v[1].y, v[2].y] + + exc_coords = { + "x1": simplify(-a*x[0]+b*x[1]+c*x[2]/(-a+b+c)), + "x2": simplify(a*x[0]-b*x[1]+c*x[2]/(a-b+c)), + "x3": simplify(a*x[0]+b*x[1]-c*x[2]/(a+b-c)), + "y1": simplify(-a*y[0]+b*y[1]+c*y[2]/(-a+b+c)), + "y2": simplify(a*y[0]-b*y[1]+c*y[2]/(a-b+c)), + "y3": simplify(a*y[0]+b*y[1]-c*y[2]/(a+b-c)) + } + + excenters = { + s[0]: Point(exc_coords["x1"], exc_coords["y1"]), + s[1]: Point(exc_coords["x2"], exc_coords["y2"]), + s[2]: Point(exc_coords["x3"], exc_coords["y3"]) + } + + return excenters + + @property + def medians(self): + """The medians of the triangle. + + A median of a triangle is a straight line through a vertex and the + midpoint of the opposite side, and divides the triangle into two + equal areas. + + Returns + ======= + + medians : dict + Each key is a vertex (Point) and each value is the median (Segment) + at that point. + + See Also + ======== + + sympy.geometry.point.Point.midpoint, sympy.geometry.line.Segment.midpoint + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.medians[p1] + Segment2D(Point2D(0, 0), Point2D(1/2, 1/2)) + + """ + s = self.sides + v = self.vertices + return {v[0]: Segment(v[0], s[1].midpoint), + v[1]: Segment(v[1], s[2].midpoint), + v[2]: Segment(v[2], s[0].midpoint)} + + @property + def medial(self): + """The medial triangle of the triangle. + + The triangle which is formed from the midpoints of the three sides. + + Returns + ======= + + medial : Triangle + + See Also + ======== + + sympy.geometry.line.Segment.midpoint + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.medial + Triangle(Point2D(1/2, 0), Point2D(1/2, 1/2), Point2D(0, 1/2)) + + """ + s = self.sides + return Triangle(s[0].midpoint, s[1].midpoint, s[2].midpoint) + + @property + def nine_point_circle(self): + """The nine-point circle of the triangle. + + Nine-point circle is the circumcircle of the medial triangle, which + passes through the feet of altitudes and the middle points of segments + connecting the vertices and the orthocenter. + + Returns + ======= + + nine_point_circle : Circle + + See also + ======== + + sympy.geometry.line.Segment.midpoint + sympy.geometry.polygon.Triangle.medial + sympy.geometry.polygon.Triangle.orthocenter + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.nine_point_circle + Circle(Point2D(1/4, 1/4), sqrt(2)/4) + + """ + return Circle(*self.medial.vertices) + + @property + def eulerline(self): + """The Euler line of the triangle. + + The line which passes through circumcenter, centroid and orthocenter. + + Returns + ======= + + eulerline : Line (or Point for equilateral triangles in which case all + centers coincide) + + Examples + ======== + + >>> from sympy import Point, Triangle + >>> p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + >>> t = Triangle(p1, p2, p3) + >>> t.eulerline + Line2D(Point2D(0, 0), Point2D(1/2, 1/2)) + + """ + if self.is_equilateral(): + return self.orthocenter + return Line(self.orthocenter, self.circumcenter) + +def rad(d): + """Return the radian value for the given degrees (pi = 180 degrees).""" + return d*pi/180 + + +def deg(r): + """Return the degree value for the given radians (pi = 180 degrees).""" + return r/pi*180 + + +def _slope(d): + rv = tan(rad(d)) + return rv + + +def _asa(d1, l, d2): + """Return triangle having side with length l on the x-axis.""" + xy = Line((0, 0), slope=_slope(d1)).intersection( + Line((l, 0), slope=_slope(180 - d2)))[0] + return Triangle((0, 0), (l, 0), xy) + + +def _sss(l1, l2, l3): + """Return triangle having side of length l1 on the x-axis.""" + c1 = Circle((0, 0), l3) + c2 = Circle((l1, 0), l2) + inter = [a for a in c1.intersection(c2) if a.y.is_nonnegative] + if not inter: + return None + pt = inter[0] + return Triangle((0, 0), (l1, 0), pt) + + +def _sas(l1, d, l2): + """Return triangle having side with length l2 on the x-axis.""" + p1 = Point(0, 0) + p2 = Point(l2, 0) + p3 = Point(cos(rad(d))*l1, sin(rad(d))*l1) + return Triangle(p1, p2, p3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_curve.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_curve.py new file mode 100644 index 0000000000000000000000000000000000000000..50aa80273a1d8eb9e414a8d591571f3127352dad --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_curve.py @@ -0,0 +1,120 @@ +from sympy.core.containers import Tuple +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.hyperbolic import asinh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.geometry import Curve, Line, Point, Ellipse, Ray, Segment, Circle, Polygon, RegularPolygon +from sympy.testing.pytest import raises, slow + + +def test_curve(): + x = Symbol('x', real=True) + s = Symbol('s') + z = Symbol('z') + + # this curve is independent of the indicated parameter + c = Curve([2*s, s**2], (z, 0, 2)) + + assert c.parameter == z + assert c.functions == (2*s, s**2) + assert c.arbitrary_point() == Point(2*s, s**2) + assert c.arbitrary_point(z) == Point(2*s, s**2) + + # this is how it is normally used + c = Curve([2*s, s**2], (s, 0, 2)) + + assert c.parameter == s + assert c.functions == (2*s, s**2) + t = Symbol('t') + # the t returned as assumptions + assert c.arbitrary_point() != Point(2*t, t**2) + t = Symbol('t', real=True) + # now t has the same assumptions so the test passes + assert c.arbitrary_point() == Point(2*t, t**2) + assert c.arbitrary_point(z) == Point(2*z, z**2) + assert c.arbitrary_point(c.parameter) == Point(2*s, s**2) + assert c.arbitrary_point(None) == Point(2*s, s**2) + assert c.plot_interval() == [t, 0, 2] + assert c.plot_interval(z) == [z, 0, 2] + + assert Curve([x, x], (x, 0, 1)).rotate(pi/2) == Curve([-x, x], (x, 0, 1)) + assert Curve([x, x], (x, 0, 1)).rotate(pi/2, (1, 2)).scale(2, 3).translate( + 1, 3).arbitrary_point(s) == \ + Line((0, 0), (1, 1)).rotate(pi/2, (1, 2)).scale(2, 3).translate( + 1, 3).arbitrary_point(s) == \ + Point(-2*s + 7, 3*s + 6) + + raises(ValueError, lambda: Curve((s), (s, 1, 2))) + raises(ValueError, lambda: Curve((x, x * 2), (1, x))) + + raises(ValueError, lambda: Curve((s, s + t), (s, 1, 2)).arbitrary_point()) + raises(ValueError, lambda: Curve((s, s + t), (t, 1, 2)).arbitrary_point(s)) + + +@slow +def test_free_symbols(): + a, b, c, d, e, f, s = symbols('a:f,s') + assert Point(a, b).free_symbols == {a, b} + assert Line((a, b), (c, d)).free_symbols == {a, b, c, d} + assert Ray((a, b), (c, d)).free_symbols == {a, b, c, d} + assert Ray((a, b), angle=c).free_symbols == {a, b, c} + assert Segment((a, b), (c, d)).free_symbols == {a, b, c, d} + assert Line((a, b), slope=c).free_symbols == {a, b, c} + assert Curve((a*s, b*s), (s, c, d)).free_symbols == {a, b, c, d} + assert Ellipse((a, b), c, d).free_symbols == {a, b, c, d} + assert Ellipse((a, b), c, eccentricity=d).free_symbols == \ + {a, b, c, d} + assert Ellipse((a, b), vradius=c, eccentricity=d).free_symbols == \ + {a, b, c, d} + assert Circle((a, b), c).free_symbols == {a, b, c} + assert Circle((a, b), (c, d), (e, f)).free_symbols == \ + {e, d, c, b, f, a} + assert Polygon((a, b), (c, d), (e, f)).free_symbols == \ + {e, b, d, f, a, c} + assert RegularPolygon((a, b), c, d, e).free_symbols == {e, a, b, c, d} + + +def test_transform(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + c = Curve((x, x**2), (x, 0, 1)) + cout = Curve((2*x - 4, 3*x**2 - 10), (x, 0, 1)) + pts = [Point(0, 0), Point(S.Half, Rational(1, 4)), Point(1, 1)] + pts_out = [Point(-4, -10), Point(-3, Rational(-37, 4)), Point(-2, -7)] + + assert c.scale(2, 3, (4, 5)) == cout + assert [c.subs(x, xi/2) for xi in Tuple(0, 1, 2)] == pts + assert [cout.subs(x, xi/2) for xi in Tuple(0, 1, 2)] == pts_out + assert Curve((x + y, 3*x), (x, 0, 1)).subs(y, S.Half) == \ + Curve((x + S.Half, 3*x), (x, 0, 1)) + assert Curve((x, 3*x), (x, 0, 1)).translate(4, 5) == \ + Curve((x + 4, 3*x + 5), (x, 0, 1)) + + +def test_length(): + t = Symbol('t', real=True) + + c1 = Curve((t, 0), (t, 0, 1)) + assert c1.length == 1 + + c2 = Curve((t, t), (t, 0, 1)) + assert c2.length == sqrt(2) + + c3 = Curve((t ** 2, t), (t, 2, 5)) + assert c3.length == -sqrt(17) - asinh(4) / 4 + asinh(10) / 4 + 5 * sqrt(101) / 2 + + +def test_parameter_value(): + t = Symbol('t') + C = Curve([2*t, t**2], (t, 0, 2)) + assert C.parameter_value((2, 1), t) == {t: 1} + raises(ValueError, lambda: C.parameter_value((2, 0), t)) + + +def test_issue_17997(): + t, s = symbols('t s') + c = Curve((t, t**2), (t, 0, 10)) + p = Curve([2*s, s**2], (s, 0, 2)) + assert c(2) == Point(2, 4) + assert p(1) == Point(2, 1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_ellipse.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_ellipse.py new file mode 100644 index 0000000000000000000000000000000000000000..a79eba8c35771bda9f0980aca68d937f8e625c0a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_ellipse.py @@ -0,0 +1,613 @@ +from sympy.core import expand +from sympy.core.numbers import (Rational, oo, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sec +from sympy.geometry.line import Segment2D +from sympy.geometry.point import Point2D +from sympy.geometry import (Circle, Ellipse, GeometryError, Line, Point, + Polygon, Ray, RegularPolygon, Segment, + Triangle, intersection) +from sympy.testing.pytest import raises, slow +from sympy.integrals.integrals import integrate +from sympy.functions.special.elliptic_integrals import elliptic_e +from sympy.functions.elementary.miscellaneous import Max + + +def test_ellipse_equation_using_slope(): + from sympy.abc import x, y + + e1 = Ellipse(Point(1, 0), 3, 2) + assert str(e1.equation(_slope=1)) == str((-x + y + 1)**2/8 + (x + y - 1)**2/18 - 1) + + e2 = Ellipse(Point(0, 0), 4, 1) + assert str(e2.equation(_slope=1)) == str((-x + y)**2/2 + (x + y)**2/32 - 1) + + e3 = Ellipse(Point(1, 5), 6, 2) + assert str(e3.equation(_slope=2)) == str((-2*x + y - 3)**2/20 + (x + 2*y - 11)**2/180 - 1) + + +def test_object_from_equation(): + from sympy.abc import x, y, a, b, c, d, e + assert Circle(x**2 + y**2 + 3*x + 4*y - 8) == Circle(Point2D(S(-3) / 2, -2), sqrt(57) / 2) + assert Circle(x**2 + y**2 + 6*x + 8*y + 25) == Circle(Point2D(-3, -4), 0) + assert Circle(a**2 + b**2 + 6*a + 8*b + 25, x='a', y='b') == Circle(Point2D(-3, -4), 0) + assert Circle(x**2 + y**2 - 25) == Circle(Point2D(0, 0), 5) + assert Circle(x**2 + y**2) == Circle(Point2D(0, 0), 0) + assert Circle(a**2 + b**2, x='a', y='b') == Circle(Point2D(0, 0), 0) + assert Circle(x**2 + y**2 + 6*x + 8) == Circle(Point2D(-3, 0), 1) + assert Circle(x**2 + y**2 + 6*y + 8) == Circle(Point2D(0, -3), 1) + assert Circle((x - 1)**2 + y**2 - 9) == Circle(Point2D(1, 0), 3) + assert Circle(6*(x**2) + 6*(y**2) + 6*x + 8*y - 25) == Circle(Point2D(Rational(-1, 2), Rational(-2, 3)), 5*sqrt(7)/6) + assert Circle(Eq(a**2 + b**2, 25), x='a', y=b) == Circle(Point2D(0, 0), 5) + raises(GeometryError, lambda: Circle(x**2 + y**2 + 3*x + 4*y + 26)) + raises(GeometryError, lambda: Circle(x**2 + y**2 + 25)) + raises(GeometryError, lambda: Circle(a**2 + b**2 + 25, x='a', y='b')) + raises(GeometryError, lambda: Circle(x**2 + 6*y + 8)) + raises(GeometryError, lambda: Circle(6*(x ** 2) + 4*(y**2) + 6*x + 8*y + 25)) + raises(ValueError, lambda: Circle(a**2 + b**2 + 3*a + 4*b - 8)) + # .equation() adds 'real=True' assumption; '==' would fail if assumptions differed + x, y = symbols('x y', real=True) + eq = a*x**2 + a*y**2 + c*x + d*y + e + assert expand(Circle(eq).equation()*a) == eq + + +@slow +def test_ellipse_geom(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + t = Symbol('t', real=True) + y1 = Symbol('y1', real=True) + half = S.Half + p1 = Point(0, 0) + p2 = Point(1, 1) + p4 = Point(0, 1) + + e1 = Ellipse(p1, 1, 1) + e2 = Ellipse(p2, half, 1) + e3 = Ellipse(p1, y1, y1) + c1 = Circle(p1, 1) + c2 = Circle(p2, 1) + c3 = Circle(Point(sqrt(2), sqrt(2)), 1) + l1 = Line(p1, p2) + + # Test creation with three points + cen, rad = Point(3*half, 2), 5*half + assert Circle(Point(0, 0), Point(3, 0), Point(0, 4)) == Circle(cen, rad) + assert Circle(Point(0, 0), Point(1, 1), Point(2, 2)) == Segment2D(Point2D(0, 0), Point2D(2, 2)) + + raises(ValueError, lambda: Ellipse(None, None, None, 1)) + raises(ValueError, lambda: Ellipse()) + raises(GeometryError, lambda: Circle(Point(0, 0))) + raises(GeometryError, lambda: Circle(Symbol('x')*Symbol('y'))) + + # Basic Stuff + assert Ellipse(None, 1, 1).center == Point(0, 0) + assert e1 == c1 + assert e1 != e2 + assert e1 != l1 + assert p4 in e1 + assert e1 in e1 + assert e2 in e2 + assert 1 not in e2 + assert p2 not in e2 + assert e1.area == pi + assert e2.area == pi/2 + assert e3.area == pi*y1*abs(y1) + assert c1.area == e1.area + assert c1.circumference == e1.circumference + assert e3.circumference == 2*pi*y1 + assert e1.plot_interval() == e2.plot_interval() == [t, -pi, pi] + assert e1.plot_interval(x) == e2.plot_interval(x) == [x, -pi, pi] + + assert c1.minor == 1 + assert c1.major == 1 + assert c1.hradius == 1 + assert c1.vradius == 1 + + assert Ellipse((1, 1), 0, 0) == Point(1, 1) + assert Ellipse((1, 1), 1, 0) == Segment(Point(0, 1), Point(2, 1)) + assert Ellipse((1, 1), 0, 1) == Segment(Point(1, 0), Point(1, 2)) + + # Private Functions + assert hash(c1) == hash(Circle(Point(1, 0), Point(0, 1), Point(0, -1))) + assert c1 in e1 + assert (Line(p1, p2) in e1) is False + assert e1.__cmp__(e1) == 0 + assert e1.__cmp__(Point(0, 0)) > 0 + + # Encloses + assert e1.encloses(Segment(Point(-0.5, -0.5), Point(0.5, 0.5))) is True + assert e1.encloses(Line(p1, p2)) is False + assert e1.encloses(Ray(p1, p2)) is False + assert e1.encloses(e1) is False + assert e1.encloses( + Polygon(Point(-0.5, -0.5), Point(-0.5, 0.5), Point(0.5, 0.5))) is True + assert e1.encloses(RegularPolygon(p1, 0.5, 3)) is True + assert e1.encloses(RegularPolygon(p1, 5, 3)) is False + assert e1.encloses(RegularPolygon(p2, 5, 3)) is False + + assert e2.arbitrary_point() in e2 + raises(ValueError, lambda: Ellipse(Point(x, y), 1, 1).arbitrary_point(parameter='x')) + + # Foci + f1, f2 = Point(sqrt(12), 0), Point(-sqrt(12), 0) + ef = Ellipse(Point(0, 0), 4, 2) + assert ef.foci in [(f1, f2), (f2, f1)] + + # Tangents + v = sqrt(2) / 2 + p1_1 = Point(v, v) + p1_2 = p2 + Point(half, 0) + p1_3 = p2 + Point(0, 1) + assert e1.tangent_lines(p4) == c1.tangent_lines(p4) + assert e2.tangent_lines(p1_2) == [Line(Point(Rational(3, 2), 1), Point(Rational(3, 2), S.Half))] + assert e2.tangent_lines(p1_3) == [Line(Point(1, 2), Point(Rational(5, 4), 2))] + assert c1.tangent_lines(p1_1) != [Line(p1_1, Point(0, sqrt(2)))] + assert c1.tangent_lines(p1) == [] + assert e2.is_tangent(Line(p1_2, p2 + Point(half, 1))) + assert e2.is_tangent(Line(p1_3, p2 + Point(half, 1))) + assert c1.is_tangent(Line(p1_1, Point(0, sqrt(2)))) + assert e1.is_tangent(Line(Point(0, 0), Point(1, 1))) is False + assert c1.is_tangent(e1) is True + assert c1.is_tangent(Ellipse(Point(2, 0), 1, 1)) is True + assert c1.is_tangent( + Polygon(Point(1, 1), Point(1, -1), Point(2, 0))) is False + assert c1.is_tangent( + Polygon(Point(1, 1), Point(1, 0), Point(2, 0))) is False + assert Circle(Point(5, 5), 3).is_tangent(Circle(Point(0, 5), 1)) is False + + assert Ellipse(Point(5, 5), 2, 1).tangent_lines(Point(0, 0)) == \ + [Line(Point(0, 0), Point(Rational(77, 25), Rational(132, 25))), + Line(Point(0, 0), Point(Rational(33, 5), Rational(22, 5)))] + assert Ellipse(Point(5, 5), 2, 1).tangent_lines(Point(3, 4)) == \ + [Line(Point(3, 4), Point(4, 4)), Line(Point(3, 4), Point(3, 5))] + assert Circle(Point(5, 5), 2).tangent_lines(Point(3, 3)) == \ + [Line(Point(3, 3), Point(4, 3)), Line(Point(3, 3), Point(3, 4))] + assert Circle(Point(5, 5), 2).tangent_lines(Point(5 - 2*sqrt(2), 5)) == \ + [Line(Point(5 - 2*sqrt(2), 5), Point(5 - sqrt(2), 5 - sqrt(2))), + Line(Point(5 - 2*sqrt(2), 5), Point(5 - sqrt(2), 5 + sqrt(2))), ] + assert Circle(Point(5, 5), 5).tangent_lines(Point(4, 0)) == \ + [Line(Point(4, 0), Point(Rational(40, 13), Rational(5, 13))), + Line(Point(4, 0), Point(5, 0))] + assert Circle(Point(5, 5), 5).tangent_lines(Point(0, 6)) == \ + [Line(Point(0, 6), Point(0, 7)), + Line(Point(0, 6), Point(Rational(5, 13), Rational(90, 13)))] + + # for numerical calculations, we shouldn't demand exact equality, + # so only test up to the desired precision + def lines_close(l1, l2, prec): + """ tests whether l1 and 12 are within 10**(-prec) + of each other """ + return abs(l1.p1 - l2.p1) < 10**(-prec) and abs(l1.p2 - l2.p2) < 10**(-prec) + def line_list_close(ll1, ll2, prec): + return all(lines_close(l1, l2, prec) for l1, l2 in zip(ll1, ll2)) + + e = Ellipse(Point(0, 0), 2, 1) + assert e.normal_lines(Point(0, 0)) == \ + [Line(Point(0, 0), Point(0, 1)), Line(Point(0, 0), Point(1, 0))] + assert e.normal_lines(Point(1, 0)) == \ + [Line(Point(0, 0), Point(1, 0))] + assert e.normal_lines((0, 1)) == \ + [Line(Point(0, 0), Point(0, 1))] + assert line_list_close(e.normal_lines(Point(1, 1), 2), [ + Line(Point(Rational(-51, 26), Rational(-1, 5)), Point(Rational(-25, 26), Rational(17, 83))), + Line(Point(Rational(28, 29), Rational(-7, 8)), Point(Rational(57, 29), Rational(-9, 2)))], 2) + # test the failure of Poly.intervals and checks a point on the boundary + p = Point(sqrt(3), S.Half) + assert p in e + assert line_list_close(e.normal_lines(p, 2), [ + Line(Point(Rational(-341, 171), Rational(-1, 13)), Point(Rational(-170, 171), Rational(5, 64))), + Line(Point(Rational(26, 15), Rational(-1, 2)), Point(Rational(41, 15), Rational(-43, 26)))], 2) + # be sure to use the slope that isn't undefined on boundary + e = Ellipse((0, 0), 2, 2*sqrt(3)/3) + assert line_list_close(e.normal_lines((1, 1), 2), [ + Line(Point(Rational(-64, 33), Rational(-20, 71)), Point(Rational(-31, 33), Rational(2, 13))), + Line(Point(1, -1), Point(2, -4))], 2) + # general ellipse fails except under certain conditions + e = Ellipse((0, 0), x, 1) + assert e.normal_lines((x + 1, 0)) == [Line(Point(0, 0), Point(1, 0))] + raises(NotImplementedError, lambda: e.normal_lines((x + 1, 1))) + # Properties + major = 3 + minor = 1 + e4 = Ellipse(p2, minor, major) + assert e4.focus_distance == sqrt(major**2 - minor**2) + ecc = e4.focus_distance / major + assert e4.eccentricity == ecc + assert e4.periapsis == major*(1 - ecc) + assert e4.apoapsis == major*(1 + ecc) + assert e4.semilatus_rectum == major*(1 - ecc ** 2) + # independent of orientation + e4 = Ellipse(p2, major, minor) + assert e4.focus_distance == sqrt(major**2 - minor**2) + ecc = e4.focus_distance / major + assert e4.eccentricity == ecc + assert e4.periapsis == major*(1 - ecc) + assert e4.apoapsis == major*(1 + ecc) + + # Intersection + l1 = Line(Point(1, -5), Point(1, 5)) + l2 = Line(Point(-5, -1), Point(5, -1)) + l3 = Line(Point(-1, -1), Point(1, 1)) + l4 = Line(Point(-10, 0), Point(0, 10)) + pts_c1_l3 = [Point(sqrt(2)/2, sqrt(2)/2), Point(-sqrt(2)/2, -sqrt(2)/2)] + + assert intersection(e2, l4) == [] + assert intersection(c1, Point(1, 0)) == [Point(1, 0)] + assert intersection(c1, l1) == [Point(1, 0)] + assert intersection(c1, l2) == [Point(0, -1)] + assert intersection(c1, l3) in [pts_c1_l3, [pts_c1_l3[1], pts_c1_l3[0]]] + assert intersection(c1, c2) == [Point(0, 1), Point(1, 0)] + assert intersection(c1, c3) == [Point(sqrt(2)/2, sqrt(2)/2)] + assert e1.intersection(l1) == [Point(1, 0)] + assert e2.intersection(l4) == [] + assert e1.intersection(Circle(Point(0, 2), 1)) == [Point(0, 1)] + assert e1.intersection(Circle(Point(5, 0), 1)) == [] + assert e1.intersection(Ellipse(Point(2, 0), 1, 1)) == [Point(1, 0)] + assert e1.intersection(Ellipse(Point(5, 0), 1, 1)) == [] + assert e1.intersection(Point(2, 0)) == [] + assert e1.intersection(e1) == e1 + assert intersection(Ellipse(Point(0, 0), 2, 1), Ellipse(Point(3, 0), 1, 2)) == [Point(2, 0)] + assert intersection(Circle(Point(0, 0), 2), Circle(Point(3, 0), 1)) == [Point(2, 0)] + assert intersection(Circle(Point(0, 0), 2), Circle(Point(7, 0), 1)) == [] + assert intersection(Ellipse(Point(0, 0), 5, 17), Ellipse(Point(4, 0), 1, 0.2) + ) == [Point(5.0, 0, evaluate=False)] + assert intersection(Ellipse(Point(0, 0), 5, 17), Ellipse(Point(4, 0), 0.999, 0.2)) == [] + assert Circle((0, 0), S.Half).intersection( + Triangle((-1, 0), (1, 0), (0, 1))) == [ + Point(Rational(-1, 2), 0), Point(S.Half, 0)] + raises(TypeError, lambda: intersection(e2, Line((0, 0, 0), (0, 0, 1)))) + raises(TypeError, lambda: intersection(e2, Rational(12))) + raises(TypeError, lambda: Ellipse.intersection(e2, 1)) + # some special case intersections + csmall = Circle(p1, 3) + cbig = Circle(p1, 5) + cout = Circle(Point(5, 5), 1) + # one circle inside of another + assert csmall.intersection(cbig) == [] + # separate circles + assert csmall.intersection(cout) == [] + # coincident circles + assert csmall.intersection(csmall) == csmall + + v = sqrt(2) + t1 = Triangle(Point(0, v), Point(0, -v), Point(v, 0)) + points = intersection(t1, c1) + assert len(points) == 4 + assert Point(0, 1) in points + assert Point(0, -1) in points + assert Point(v/2, v/2) in points + assert Point(v/2, -v/2) in points + + circ = Circle(Point(0, 0), 5) + elip = Ellipse(Point(0, 0), 5, 20) + assert intersection(circ, elip) in \ + [[Point(5, 0), Point(-5, 0)], [Point(-5, 0), Point(5, 0)]] + assert elip.tangent_lines(Point(0, 0)) == [] + elip = Ellipse(Point(0, 0), 3, 2) + assert elip.tangent_lines(Point(3, 0)) == \ + [Line(Point(3, 0), Point(3, -12))] + + e1 = Ellipse(Point(0, 0), 5, 10) + e2 = Ellipse(Point(2, 1), 4, 8) + a = Rational(53, 17) + c = 2*sqrt(3991)/17 + ans = [Point(a - c/8, a/2 + c), Point(a + c/8, a/2 - c)] + assert e1.intersection(e2) == ans + e2 = Ellipse(Point(x, y), 4, 8) + c = sqrt(3991) + ans = [Point(-c/68 + a, c*Rational(2, 17) + a/2), Point(c/68 + a, c*Rational(-2, 17) + a/2)] + assert [p.subs({x: 2, y:1}) for p in e1.intersection(e2)] == ans + + # Combinations of above + assert e3.is_tangent(e3.tangent_lines(p1 + Point(y1, 0))[0]) + + e = Ellipse((1, 2), 3, 2) + assert e.tangent_lines(Point(10, 0)) == \ + [Line(Point(10, 0), Point(1, 0)), + Line(Point(10, 0), Point(Rational(14, 5), Rational(18, 5)))] + + # encloses_point + e = Ellipse((0, 0), 1, 2) + assert e.encloses_point(e.center) + assert e.encloses_point(e.center + Point(0, e.vradius - Rational(1, 10))) + assert e.encloses_point(e.center + Point(e.hradius - Rational(1, 10), 0)) + assert e.encloses_point(e.center + Point(e.hradius, 0)) is False + assert e.encloses_point( + e.center + Point(e.hradius + Rational(1, 10), 0)) is False + e = Ellipse((0, 0), 2, 1) + assert e.encloses_point(e.center) + assert e.encloses_point(e.center + Point(0, e.vradius - Rational(1, 10))) + assert e.encloses_point(e.center + Point(e.hradius - Rational(1, 10), 0)) + assert e.encloses_point(e.center + Point(e.hradius, 0)) is False + assert e.encloses_point( + e.center + Point(e.hradius + Rational(1, 10), 0)) is False + assert c1.encloses_point(Point(1, 0)) is False + assert c1.encloses_point(Point(0.3, 0.4)) is True + + assert e.scale(2, 3) == Ellipse((0, 0), 4, 3) + assert e.scale(3, 6) == Ellipse((0, 0), 6, 6) + assert e.rotate(pi) == e + assert e.rotate(pi, (1, 2)) == Ellipse(Point(2, 4), 2, 1) + raises(NotImplementedError, lambda: e.rotate(pi/3)) + + # Circle rotation tests (Issue #11743) + # Link - https://github.com/sympy/sympy/issues/11743 + cir = Circle(Point(1, 0), 1) + assert cir.rotate(pi/2) == Circle(Point(0, 1), 1) + assert cir.rotate(pi/3) == Circle(Point(S.Half, sqrt(3)/2), 1) + assert cir.rotate(pi/3, Point(1, 0)) == Circle(Point(1, 0), 1) + assert cir.rotate(pi/3, Point(0, 1)) == Circle(Point(S.Half + sqrt(3)/2, S.Half + sqrt(3)/2), 1) + + +def test_construction(): + e1 = Ellipse(hradius=2, vradius=1, eccentricity=None) + assert e1.eccentricity == sqrt(3)/2 + + e2 = Ellipse(hradius=2, vradius=None, eccentricity=sqrt(3)/2) + assert e2.vradius == 1 + + e3 = Ellipse(hradius=None, vradius=1, eccentricity=sqrt(3)/2) + assert e3.hradius == 2 + + # filter(None, iterator) filters out anything falsey, including 0 + # eccentricity would be filtered out in this case and the constructor would throw an error + e4 = Ellipse(Point(0, 0), hradius=1, eccentricity=0) + assert e4.vradius == 1 + + #tests for eccentricity > 1 + raises(GeometryError, lambda: Ellipse(Point(3, 1), hradius=3, eccentricity = S(3)/2)) + raises(GeometryError, lambda: Ellipse(Point(3, 1), hradius=3, eccentricity=sec(5))) + raises(GeometryError, lambda: Ellipse(Point(3, 1), hradius=3, eccentricity=S.Pi-S(2))) + + #tests for eccentricity = 1 + #if vradius is not defined + assert Ellipse(None, 1, None, 1).length == 2 + #if hradius is not defined + raises(GeometryError, lambda: Ellipse(None, None, 1, eccentricity = 1)) + + #tests for eccentricity < 0 + raises(GeometryError, lambda: Ellipse(Point(3, 1), hradius=3, eccentricity = -3)) + raises(GeometryError, lambda: Ellipse(Point(3, 1), hradius=3, eccentricity = -0.5)) + +def test_ellipse_random_point(): + y1 = Symbol('y1', real=True) + e3 = Ellipse(Point(0, 0), y1, y1) + rx, ry = Symbol('rx'), Symbol('ry') + for ind in range(0, 5): + r = e3.random_point() + # substitution should give zero*y1**2 + assert e3.equation(rx, ry).subs(zip((rx, ry), r.args)).equals(0) + # test for the case with seed + r = e3.random_point(seed=1) + assert e3.equation(rx, ry).subs(zip((rx, ry), r.args)).equals(0) + + +def test_repr(): + assert repr(Circle((0, 1), 2)) == 'Circle(Point2D(0, 1), 2)' + + +def test_transform(): + c = Circle((1, 1), 2) + assert c.scale(-1) == Circle((-1, 1), 2) + assert c.scale(y=-1) == Circle((1, -1), 2) + assert c.scale(2) == Ellipse((2, 1), 4, 2) + + assert Ellipse((0, 0), 2, 3).scale(2, 3, (4, 5)) == \ + Ellipse(Point(-4, -10), 4, 9) + assert Circle((0, 0), 2).scale(2, 3, (4, 5)) == \ + Ellipse(Point(-4, -10), 4, 6) + assert Ellipse((0, 0), 2, 3).scale(3, 3, (4, 5)) == \ + Ellipse(Point(-8, -10), 6, 9) + assert Circle((0, 0), 2).scale(3, 3, (4, 5)) == \ + Circle(Point(-8, -10), 6) + assert Circle(Point(-8, -10), 6).scale(Rational(1, 3), Rational(1, 3), (4, 5)) == \ + Circle((0, 0), 2) + assert Circle((0, 0), 2).translate(4, 5) == \ + Circle((4, 5), 2) + assert Circle((0, 0), 2).scale(3, 3) == \ + Circle((0, 0), 6) + + +def test_bounds(): + e1 = Ellipse(Point(0, 0), 3, 5) + e2 = Ellipse(Point(2, -2), 7, 7) + c1 = Circle(Point(2, -2), 7) + c2 = Circle(Point(-2, 0), Point(0, 2), Point(2, 0)) + assert e1.bounds == (-3, -5, 3, 5) + assert e2.bounds == (-5, -9, 9, 5) + assert c1.bounds == (-5, -9, 9, 5) + assert c2.bounds == (-2, -2, 2, 2) + + +def test_reflect(): + b = Symbol('b') + m = Symbol('m') + l = Line((0, b), slope=m) + t1 = Triangle((0, 0), (1, 0), (2, 3)) + assert t1.area == -t1.reflect(l).area + e = Ellipse((1, 0), 1, 2) + assert e.area == -e.reflect(Line((1, 0), slope=0)).area + assert e.area == -e.reflect(Line((1, 0), slope=oo)).area + raises(NotImplementedError, lambda: e.reflect(Line((1, 0), slope=m))) + assert Circle((0, 1), 1).reflect(Line((0, 0), (1, 1))) == Circle(Point2D(1, 0), -1) + + +def test_is_tangent(): + e1 = Ellipse(Point(0, 0), 3, 5) + c1 = Circle(Point(2, -2), 7) + assert e1.is_tangent(Point(0, 0)) is False + assert e1.is_tangent(Point(3, 0)) is False + assert e1.is_tangent(e1) is True + assert e1.is_tangent(Ellipse((0, 0), 1, 2)) is False + assert e1.is_tangent(Ellipse((0, 0), 3, 2)) is True + assert c1.is_tangent(Ellipse((2, -2), 7, 1)) is True + assert c1.is_tangent(Circle((11, -2), 2)) is True + assert c1.is_tangent(Circle((7, -2), 2)) is True + assert c1.is_tangent(Ray((-5, -2), (-15, -20))) is False + assert c1.is_tangent(Ray((-3, -2), (-15, -20))) is False + assert c1.is_tangent(Ray((-3, -22), (15, 20))) is False + assert c1.is_tangent(Ray((9, 20), (9, -20))) is True + assert c1.is_tangent(Ray((2, 5), (9, 5))) is True + assert c1.is_tangent(Segment((2, 5), (9, 5))) is True + assert e1.is_tangent(Segment((2, 2), (-7, 7))) is False + assert e1.is_tangent(Segment((0, 0), (1, 2))) is False + assert c1.is_tangent(Segment((0, 0), (-5, -2))) is False + assert e1.is_tangent(Segment((3, 0), (12, 12))) is False + assert e1.is_tangent(Segment((12, 12), (3, 0))) is False + assert e1.is_tangent(Segment((-3, 0), (3, 0))) is False + assert e1.is_tangent(Segment((-3, 5), (3, 5))) is True + assert e1.is_tangent(Line((10, 0), (10, 10))) is False + assert e1.is_tangent(Line((0, 0), (1, 1))) is False + assert e1.is_tangent(Line((-3, 0), (-2.99, -0.001))) is False + assert e1.is_tangent(Line((-3, 0), (-3, 1))) is True + assert e1.is_tangent(Polygon((0, 0), (5, 5), (5, -5))) is False + assert e1.is_tangent(Polygon((-100, -50), (-40, -334), (-70, -52))) is False + assert e1.is_tangent(Polygon((-3, 0), (3, 0), (0, 1))) is False + assert e1.is_tangent(Polygon((-3, 0), (3, 0), (0, 5))) is False + assert e1.is_tangent(Polygon((-3, 0), (0, -5), (3, 0), (0, 5))) is False + assert e1.is_tangent(Polygon((-3, -5), (-3, 5), (3, 5), (3, -5))) is True + assert c1.is_tangent(Polygon((-3, -5), (-3, 5), (3, 5), (3, -5))) is False + assert e1.is_tangent(Polygon((0, 0), (3, 0), (7, 7), (0, 5))) is False + assert e1.is_tangent(Polygon((3, 12), (3, -12), (6, 5))) is False + assert e1.is_tangent(Polygon((3, 12), (3, -12), (0, -5), (0, 5))) is False + assert e1.is_tangent(Polygon((3, 0), (5, 7), (6, -5))) is False + assert c1.is_tangent(Segment((0, 0), (-5, -2))) is False + assert e1.is_tangent(Segment((-3, 0), (3, 0))) is False + assert e1.is_tangent(Segment((-3, 5), (3, 5))) is True + assert e1.is_tangent(Polygon((0, 0), (5, 5), (5, -5))) is False + assert e1.is_tangent(Polygon((-100, -50), (-40, -334), (-70, -52))) is False + assert e1.is_tangent(Polygon((-3, -5), (-3, 5), (3, 5), (3, -5))) is True + assert c1.is_tangent(Polygon((-3, -5), (-3, 5), (3, 5), (3, -5))) is False + assert e1.is_tangent(Polygon((3, 12), (3, -12), (0, -5), (0, 5))) is False + assert e1.is_tangent(Polygon((3, 0), (5, 7), (6, -5))) is False + raises(TypeError, lambda: e1.is_tangent(Point(0, 0, 0))) + raises(TypeError, lambda: e1.is_tangent(Rational(5))) + + +def test_parameter_value(): + t = Symbol('t') + e = Ellipse(Point(0, 0), 3, 5) + assert e.parameter_value((3, 0), t) == {t: 0} + raises(ValueError, lambda: e.parameter_value((4, 0), t)) + + +@slow +def test_second_moment_of_area(): + x, y = symbols('x, y') + e = Ellipse(Point(0, 0), 5, 4) + I_yy = 2*4*integrate(sqrt(25 - x**2)*x**2, (x, -5, 5))/5 + I_xx = 2*5*integrate(sqrt(16 - y**2)*y**2, (y, -4, 4))/4 + Y = 3*sqrt(1 - x**2/5**2) + I_xy = integrate(integrate(y, (y, -Y, Y))*x, (x, -5, 5)) + assert I_yy == e.second_moment_of_area()[1] + assert I_xx == e.second_moment_of_area()[0] + assert I_xy == e.second_moment_of_area()[2] + #checking for other point + t1 = e.second_moment_of_area(Point(6,5)) + t2 = (580*pi, 845*pi, 600*pi) + assert t1==t2 + + +def test_section_modulus_and_polar_second_moment_of_area(): + d = Symbol('d', positive=True) + c = Circle((3, 7), 8) + assert c.polar_second_moment_of_area() == 2048*pi + assert c.section_modulus() == (128*pi, 128*pi) + c = Circle((2, 9), d/2) + assert c.polar_second_moment_of_area() == pi*d**3*Abs(d)/64 + pi*d*Abs(d)**3/64 + assert c.section_modulus() == (pi*d**3/S(32), pi*d**3/S(32)) + + a, b = symbols('a, b', positive=True) + e = Ellipse((4, 6), a, b) + assert e.section_modulus() == (pi*a*b**2/S(4), pi*a**2*b/S(4)) + assert e.polar_second_moment_of_area() == pi*a**3*b/S(4) + pi*a*b**3/S(4) + e = e.rotate(pi/2) # no change in polar and section modulus + assert e.section_modulus() == (pi*a**2*b/S(4), pi*a*b**2/S(4)) + assert e.polar_second_moment_of_area() == pi*a**3*b/S(4) + pi*a*b**3/S(4) + + e = Ellipse((a, b), 2, 6) + assert e.section_modulus() == (18*pi, 6*pi) + assert e.polar_second_moment_of_area() == 120*pi + + e = Ellipse(Point(0, 0), 2, 2) + assert e.section_modulus() == (2*pi, 2*pi) + assert e.section_modulus(Point(2, 2)) == (2*pi, 2*pi) + assert e.section_modulus((2, 2)) == (2*pi, 2*pi) + + +def test_circumference(): + M = Symbol('M') + m = Symbol('m') + assert Ellipse(Point(0, 0), M, m).circumference == 4 * M * elliptic_e((M ** 2 - m ** 2) / M**2) + + assert Ellipse(Point(0, 0), 5, 4).circumference == 20 * elliptic_e(S(9) / 25) + + # circle + assert Ellipse(None, 1, None, 0).circumference == 2*pi + + # test numerically + assert abs(Ellipse(None, hradius=5, vradius=3).circumference.evalf(16) - 25.52699886339813) < 1e-10 + + +def test_issue_15259(): + assert Circle((1, 2), 0) == Point(1, 2) + + +def test_issue_15797_equals(): + Ri = 0.024127189424130748 + Ci = (0.0864931002830291, 0.0819863295239654) + A = Point(0, 0.0578591400998346) + c = Circle(Ci, Ri) # evaluated + assert c.is_tangent(c.tangent_lines(A)[0]) == True + assert c.center.x.is_Rational + assert c.center.y.is_Rational + assert c.radius.is_Rational + u = Circle(Ci, Ri, evaluate=False) # unevaluated + assert u.center.x.is_Float + assert u.center.y.is_Float + assert u.radius.is_Float + + +def test_auxiliary_circle(): + x, y, a, b = symbols('x y a b') + e = Ellipse((x, y), a, b) + # the general result + assert e.auxiliary_circle() == Circle((x, y), Max(a, b)) + # a special case where Ellipse is a Circle + assert Circle((3, 4), 8).auxiliary_circle() == Circle((3, 4), 8) + + +def test_director_circle(): + x, y, a, b = symbols('x y a b') + e = Ellipse((x, y), a, b) + # the general result + assert e.director_circle() == Circle((x, y), sqrt(a**2 + b**2)) + # a special case where Ellipse is a Circle + assert Circle((3, 4), 8).director_circle() == Circle((3, 4), 8*sqrt(2)) + + +def test_evolute(): + #ellipse centered at h,k + x, y, h, k = symbols('x y h k',real = True) + a, b = symbols('a b') + e = Ellipse(Point(h, k), a, b) + t1 = (e.hradius*(x - e.center.x))**Rational(2, 3) + t2 = (e.vradius*(y - e.center.y))**Rational(2, 3) + E = t1 + t2 - (e.hradius**2 - e.vradius**2)**Rational(2, 3) + assert e.evolute() == E + #Numerical Example + e = Ellipse(Point(1, 1), 6, 3) + t1 = (6*(x - 1))**Rational(2, 3) + t2 = (3*(y - 1))**Rational(2, 3) + E = t1 + t2 - (27)**Rational(2, 3) + assert e.evolute() == E + + +def test_svg(): + e1 = Ellipse(Point(1, 0), 3, 2) + assert e1._svg(2, "#FFAAFF") == '' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_entity.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_entity.py new file mode 100644 index 0000000000000000000000000000000000000000..0d440fd5dbd193c7c490b45a706fab2703e247ec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_entity.py @@ -0,0 +1,120 @@ +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.geometry import (Circle, Ellipse, Point, Line, Parabola, + Polygon, Ray, RegularPolygon, Segment, Triangle, Plane, Curve) +from sympy.geometry.entity import scale, GeometryEntity +from sympy.testing.pytest import raises + + +def test_entity(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + + assert GeometryEntity(x, y) in GeometryEntity(x, y) + raises(NotImplementedError, lambda: Point(0, 0) in GeometryEntity(x, y)) + + assert GeometryEntity(x, y) == GeometryEntity(x, y) + assert GeometryEntity(x, y).equals(GeometryEntity(x, y)) + + c = Circle((0, 0), 5) + assert GeometryEntity.encloses(c, Point(0, 0)) + assert GeometryEntity.encloses(c, Segment((0, 0), (1, 1))) + assert GeometryEntity.encloses(c, Line((0, 0), (1, 1))) is False + assert GeometryEntity.encloses(c, Circle((0, 0), 4)) + assert GeometryEntity.encloses(c, Polygon(Point(0, 0), Point(1, 0), Point(0, 1))) + assert GeometryEntity.encloses(c, RegularPolygon(Point(8, 8), 1, 3)) is False + + +def test_svg(): + a = Symbol('a') + b = Symbol('b') + d = Symbol('d') + + entity = Circle(Point(a, b), d) + assert entity._repr_svg_() is None + + entity = Circle(Point(0, 0), S.Infinity) + assert entity._repr_svg_() is None + + +def test_subs(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + p = Point(x, 2) + q = Point(1, 1) + r = Point(3, 4) + for o in [p, + Segment(p, q), + Ray(p, q), + Line(p, q), + Triangle(p, q, r), + RegularPolygon(p, 3, 6), + Polygon(p, q, r, Point(5, 4)), + Circle(p, 3), + Ellipse(p, 3, 4)]: + assert 'y' in str(o.subs(x, y)) + assert p.subs({x: 1}) == Point(1, 2) + assert Point(1, 2).subs(Point(1, 2), Point(3, 4)) == Point(3, 4) + assert Point(1, 2).subs((1, 2), Point(3, 4)) == Point(3, 4) + assert Point(1, 2).subs(Point(1, 2), Point(3, 4)) == Point(3, 4) + assert Point(1, 2).subs({(1, 2)}) == Point(2, 2) + raises(ValueError, lambda: Point(1, 2).subs(1)) + raises(TypeError, lambda: Point(1, 1).subs((Point(1, 1), Point(1, + 2)), 1, 2)) + + +def test_transform(): + assert scale(1, 2, (3, 4)).tolist() == \ + [[1, 0, 0], [0, 2, 0], [0, -4, 1]] + + +def test_reflect_entity_overrides(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + b = Symbol('b') + m = Symbol('m') + l = Line((0, b), slope=m) + p = Point(x, y) + r = p.reflect(l) + c = Circle((x, y), 3) + cr = c.reflect(l) + assert cr == Circle(r, -3) + assert c.area == -cr.area + + pent = RegularPolygon((1, 2), 1, 5) + slope = S.ComplexInfinity + while slope is S.ComplexInfinity: + slope = Rational(*(x._random()/2).as_real_imag()) + l = Line(pent.vertices[1], slope=slope) + rpent = pent.reflect(l) + assert rpent.center == pent.center.reflect(l) + rvert = [i.reflect(l) for i in pent.vertices] + for v in rpent.vertices: + for i in range(len(rvert)): + ri = rvert[i] + if ri.equals(v): + rvert.remove(ri) + break + assert not rvert + assert pent.area.equals(-rpent.area) + + +def test_geometry_EvalfMixin(): + x = pi + t = Symbol('t') + for g in [ + Point(x, x), + Plane(Point(0, x, 0), (0, 0, x)), + Curve((x*t, x), (t, 0, x)), + Ellipse((x, x), x, -x), + Circle((x, x), x), + Line((0, x), (x, 0)), + Segment((0, x), (x, 0)), + Ray((0, x), (x, 0)), + Parabola((0, x), Line((-x, 0), (x, 0))), + Polygon((0, 0), (0, x), (x, 0), (x, x)), + RegularPolygon((0, x), x, 4, x), + Triangle((0, 0), (x, 0), (x, x)), + ]: + assert str(g).replace('pi', '3.1') == str(g.n(2)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_geometrysets.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_geometrysets.py new file mode 100644 index 0000000000000000000000000000000000000000..c52898b3c9ba4e9db80c244db3aebf88db2cc8b4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_geometrysets.py @@ -0,0 +1,38 @@ +from sympy.core.numbers import Rational +from sympy.core.singleton import S +from sympy.geometry import Circle, Line, Point, Polygon, Segment +from sympy.sets import FiniteSet, Union, Intersection, EmptySet + + +def test_booleans(): + """ test basic unions and intersections """ + half = S.Half + + p1, p2, p3, p4 = map(Point, [(0, 0), (1, 0), (5, 1), (0, 1)]) + p5, p6, p7 = map(Point, [(3, 2), (1, -1), (0, 2)]) + l1 = Line(Point(0,0), Point(1,1)) + l2 = Line(Point(half, half), Point(5,5)) + l3 = Line(p2, p3) + l4 = Line(p3, p4) + poly1 = Polygon(p1, p2, p3, p4) + poly2 = Polygon(p5, p6, p7) + poly3 = Polygon(p1, p2, p5) + assert Union(l1, l2).equals(l1) + assert Intersection(l1, l2).equals(l1) + assert Intersection(l1, l4) == FiniteSet(Point(1,1)) + assert Intersection(Union(l1, l4), l3) == FiniteSet(Point(Rational(-1, 3), Rational(-1, 3)), Point(5, 1)) + assert Intersection(l1, FiniteSet(Point(7,-7))) == EmptySet + assert Intersection(Circle(Point(0,0), 3), Line(p1,p2)) == FiniteSet(Point(-3,0), Point(3,0)) + assert Intersection(l1, FiniteSet(p1)) == FiniteSet(p1) + assert Union(l1, FiniteSet(p1)) == l1 + + fs = FiniteSet(Point(Rational(1, 3), 1), Point(Rational(2, 3), 0), Point(Rational(9, 5), Rational(1, 5)), Point(Rational(7, 3), 1)) + # test the intersection of polygons + assert Intersection(poly1, poly2) == fs + # make sure if we union polygons with subsets, the subsets go away + assert Union(poly1, poly2, fs) == Union(poly1, poly2) + # make sure that if we union with a FiniteSet that isn't a subset, + # that the points in the intersection stop being listed + assert Union(poly1, FiniteSet(Point(0,0), Point(3,5))) == Union(poly1, FiniteSet(Point(3,5))) + # intersect two polygons that share an edge + assert Intersection(poly1, poly3) == Union(FiniteSet(Point(Rational(3, 2), 1), Point(2, 1)), Segment(Point(0, 0), Point(1, 0))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_line.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_line.py new file mode 100644 index 0000000000000000000000000000000000000000..5158ec05ab414020fbbe2681a2658454dd15b6eb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_line.py @@ -0,0 +1,861 @@ +from sympy.core.numbers import (Float, Rational, oo, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, cos, sin) +from sympy.sets import EmptySet +from sympy.simplify.simplify import simplify +from sympy.functions.elementary.trigonometric import tan +from sympy.geometry import (Circle, GeometryError, Line, Point, Ray, + Segment, Triangle, intersection, Point3D, Line3D, Ray3D, Segment3D, + Point2D, Line2D, Plane) +from sympy.geometry.line import Undecidable +from sympy.geometry.polygon import _asa as asa +from sympy.utilities.iterables import cartes +from sympy.testing.pytest import raises, warns + + +x = Symbol('x', real=True) +y = Symbol('y', real=True) +z = Symbol('z', real=True) +k = Symbol('k', real=True) +x1 = Symbol('x1', real=True) +y1 = Symbol('y1', real=True) +t = Symbol('t', real=True) +a, b = symbols('a,b', real=True) +m = symbols('m', real=True) + + +def test_object_from_equation(): + from sympy.abc import x, y, a, b + assert Line(3*x + y + 18) == Line2D(Point2D(0, -18), Point2D(1, -21)) + assert Line(3*x + 5 * y + 1) == Line2D( + Point2D(0, Rational(-1, 5)), Point2D(1, Rational(-4, 5))) + assert Line(3*a + b + 18, x="a", y="b") == Line2D( + Point2D(0, -18), Point2D(1, -21)) + assert Line(3*x + y) == Line2D(Point2D(0, 0), Point2D(1, -3)) + assert Line(x + y) == Line2D(Point2D(0, 0), Point2D(1, -1)) + assert Line(Eq(3*a + b, -18), x="a", y=b) == Line2D( + Point2D(0, -18), Point2D(1, -21)) + # issue 22361 + assert Line(x - 1) == Line2D(Point2D(1, 0), Point2D(1, 1)) + assert Line(2*x - 2, y=x) == Line2D(Point2D(0, 1), Point2D(1, 1)) + assert Line(y) == Line2D(Point2D(0, 0), Point2D(1, 0)) + assert Line(2*y, x=y) == Line2D(Point2D(0, 0), Point2D(0, 1)) + assert Line(y, x=y) == Line2D(Point2D(0, 0), Point2D(0, 1)) + raises(ValueError, lambda: Line(x / y)) + raises(ValueError, lambda: Line(a / b, x='a', y='b')) + raises(ValueError, lambda: Line(y / x)) + raises(ValueError, lambda: Line(b / a, x='a', y='b')) + raises(ValueError, lambda: Line((x + 1)**2 + y)) + + +def feq(a, b): + """Test if two floating point values are 'equal'.""" + t_float = Float("1.0E-10") + return -t_float < a - b < t_float + + +def test_angle_between(): + a = Point(1, 2, 3, 4) + b = a.orthogonal_direction + o = a.origin + assert feq(Line.angle_between(Line(Point(0, 0), Point(1, 1)), + Line(Point(0, 0), Point(5, 0))).evalf(), pi.evalf() / 4) + assert Line(a, o).angle_between(Line(b, o)) == pi / 2 + z = Point3D(0, 0, 0) + assert Line3D.angle_between(Line3D(z, Point3D(1, 1, 1)), + Line3D(z, Point3D(5, 0, 0))) == acos(sqrt(3) / 3) + # direction of points is used to determine angle + assert Line3D.angle_between(Line3D(z, Point3D(1, 1, 1)), + Line3D(Point3D(5, 0, 0), z)) == acos(-sqrt(3) / 3) + + +def test_closing_angle(): + a = Ray((0, 0), angle=0) + b = Ray((1, 2), angle=pi/2) + assert a.closing_angle(b) == -pi/2 + assert b.closing_angle(a) == pi/2 + assert a.closing_angle(a) == 0 + + +def test_smallest_angle(): + a = Line(Point(1, 1), Point(1, 2)) + b = Line(Point(1, 1),Point(2, 3)) + assert a.smallest_angle_between(b) == acos(2*sqrt(5)/5) + + +def test_svg(): + a = Line(Point(1, 1),Point(1, 2)) + assert a._svg() == '' + a = Segment(Point(1, 0),Point(1, 1)) + assert a._svg() == '' + a = Ray(Point(2, 3), Point(3, 5)) + assert a._svg() == '' + + +def test_arbitrary_point(): + l1 = Line3D(Point3D(0, 0, 0), Point3D(1, 1, 1)) + l2 = Line(Point(x1, x1), Point(y1, y1)) + assert l2.arbitrary_point() in l2 + assert Ray((1, 1), angle=pi / 4).arbitrary_point() == \ + Point(t + 1, t + 1) + assert Segment((1, 1), (2, 3)).arbitrary_point() == Point(1 + t, 1 + 2 * t) + assert l1.perpendicular_segment(l1.arbitrary_point()) == l1.arbitrary_point() + assert Ray3D((1, 1, 1), direction_ratio=[1, 2, 3]).arbitrary_point() == \ + Point3D(t + 1, 2 * t + 1, 3 * t + 1) + assert Segment3D(Point3D(0, 0, 0), Point3D(1, 1, 1)).midpoint == \ + Point3D(S.Half, S.Half, S.Half) + assert Segment3D(Point3D(x1, x1, x1), Point3D(y1, y1, y1)).length == sqrt(3) * sqrt((x1 - y1) ** 2) + assert Segment3D((1, 1, 1), (2, 3, 4)).arbitrary_point() == \ + Point3D(t + 1, 2 * t + 1, 3 * t + 1) + raises(ValueError, (lambda: Line((x, 1), (2, 3)).arbitrary_point(x))) + + +def test_are_concurrent_2d(): + l1 = Line(Point(0, 0), Point(1, 1)) + l2 = Line(Point(x1, x1), Point(x1, 1 + x1)) + assert Line.are_concurrent(l1) is False + assert Line.are_concurrent(l1, l2) + assert Line.are_concurrent(l1, l1, l1, l2) + assert Line.are_concurrent(l1, l2, Line(Point(5, x1), Point(Rational(-3, 5), x1))) + assert Line.are_concurrent(l1, Line(Point(0, 0), Point(-x1, x1)), l2) is False + + +def test_are_concurrent_3d(): + p1 = Point3D(0, 0, 0) + l1 = Line(p1, Point3D(1, 1, 1)) + parallel_1 = Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)) + parallel_2 = Line3D(Point3D(0, 1, 0), Point3D(1, 1, 0)) + assert Line3D.are_concurrent(l1) is False + assert Line3D.are_concurrent(l1, Line(Point3D(x1, x1, x1), Point3D(y1, y1, y1))) is False + assert Line3D.are_concurrent(l1, Line3D(p1, Point3D(x1, x1, x1)), + Line(Point3D(x1, x1, x1), Point3D(x1, 1 + x1, 1))) is True + assert Line3D.are_concurrent(parallel_1, parallel_2) is False + + +def test_arguments(): + """Functions accepting `Point` objects in `geometry` + should also accept tuples, lists, and generators and + automatically convert them to points.""" + from sympy.utilities.iterables import subsets + + singles2d = ((1, 2), [1, 3], Point(1, 5)) + doubles2d = subsets(singles2d, 2) + l2d = Line(Point2D(1, 2), Point2D(2, 3)) + singles3d = ((1, 2, 3), [1, 2, 4], Point(1, 2, 6)) + doubles3d = subsets(singles3d, 2) + l3d = Line(Point3D(1, 2, 3), Point3D(1, 1, 2)) + singles4d = ((1, 2, 3, 4), [1, 2, 3, 5], Point(1, 2, 3, 7)) + doubles4d = subsets(singles4d, 2) + l4d = Line(Point(1, 2, 3, 4), Point(2, 2, 2, 2)) + # test 2D + test_single = ['contains', 'distance', 'equals', 'parallel_line', 'perpendicular_line', 'perpendicular_segment', + 'projection', 'intersection'] + for p in doubles2d: + Line2D(*p) + for func in test_single: + for p in singles2d: + getattr(l2d, func)(p) + # test 3D + for p in doubles3d: + Line3D(*p) + for func in test_single: + for p in singles3d: + getattr(l3d, func)(p) + # test 4D + for p in doubles4d: + Line(*p) + for func in test_single: + for p in singles4d: + getattr(l4d, func)(p) + + +def test_basic_properties_2d(): + p1 = Point(0, 0) + p2 = Point(1, 1) + p10 = Point(2000, 2000) + p_r3 = Ray(p1, p2).random_point() + p_r4 = Ray(p2, p1).random_point() + + l1 = Line(p1, p2) + l3 = Line(Point(x1, x1), Point(x1, 1 + x1)) + l4 = Line(p1, Point(1, 0)) + + r1 = Ray(p1, Point(0, 1)) + r2 = Ray(Point(0, 1), p1) + + s1 = Segment(p1, p10) + p_s1 = s1.random_point() + + assert Line((1, 1), slope=1) == Line((1, 1), (2, 2)) + assert Line((1, 1), slope=oo) == Line((1, 1), (1, 2)) + assert Line((1, 1), slope=oo).bounds == (1, 1, 1, 2) + assert Line((1, 1), slope=-oo) == Line((1, 1), (1, 2)) + assert Line(p1, p2).scale(2, 1) == Line(p1, Point(2, 1)) + assert Line(p1, p2) == Line(p1, p2) + assert Line(p1, p2) != Line(p2, p1) + assert l1 != Line(Point(x1, x1), Point(y1, y1)) + assert l1 != l3 + assert Line(p1, p10) != Line(p10, p1) + assert Line(p1, p10) != p1 + assert p1 in l1 # is p1 on the line l1? + assert p1 not in l3 + assert s1 in Line(p1, p10) + assert Ray(Point(0, 0), Point(0, 1)) in Ray(Point(0, 0), Point(0, 2)) + assert Ray(Point(0, 0), Point(0, 2)) in Ray(Point(0, 0), Point(0, 1)) + assert Ray(Point(0, 0), Point(0, 2)).xdirection == S.Zero + assert Ray(Point(0, 0), Point(1, 2)).xdirection == S.Infinity + assert Ray(Point(0, 0), Point(-1, 2)).xdirection == S.NegativeInfinity + assert Ray(Point(0, 0), Point(2, 0)).ydirection == S.Zero + assert Ray(Point(0, 0), Point(2, 2)).ydirection == S.Infinity + assert Ray(Point(0, 0), Point(2, -2)).ydirection == S.NegativeInfinity + assert (r1 in s1) is False + assert Segment(p1, p2) in s1 + assert Ray(Point(x1, x1), Point(x1, 1 + x1)) != Ray(p1, Point(-1, 5)) + assert Segment(p1, p2).midpoint == Point(S.Half, S.Half) + assert Segment(p1, Point(-x1, x1)).length == sqrt(2 * (x1 ** 2)) + + assert l1.slope == 1 + assert l3.slope is oo + assert l4.slope == 0 + assert Line(p1, Point(0, 1)).slope is oo + assert Line(r1.source, r1.random_point()).slope == r1.slope + assert Line(r2.source, r2.random_point()).slope == r2.slope + assert Segment(Point(0, -1), Segment(p1, Point(0, 1)).random_point()).slope == Segment(p1, Point(0, 1)).slope + + assert l4.coefficients == (0, 1, 0) + assert Line((-x, x), (-x + 1, x - 1)).coefficients == (1, 1, 0) + assert Line(p1, Point(0, 1)).coefficients == (1, 0, 0) + # issue 7963 + r = Ray((0, 0), angle=x) + assert r.subs(x, 3 * pi / 4) == Ray((0, 0), (-1, 1)) + assert r.subs(x, 5 * pi / 4) == Ray((0, 0), (-1, -1)) + assert r.subs(x, -pi / 4) == Ray((0, 0), (1, -1)) + assert r.subs(x, pi / 2) == Ray((0, 0), (0, 1)) + assert r.subs(x, -pi / 2) == Ray((0, 0), (0, -1)) + + for ind in range(0, 5): + assert l3.random_point() in l3 + + assert p_r3.x >= p1.x and p_r3.y >= p1.y + assert p_r4.x <= p2.x and p_r4.y <= p2.y + assert p1.x <= p_s1.x <= p10.x and p1.y <= p_s1.y <= p10.y + assert hash(s1) != hash(Segment(p10, p1)) + + assert s1.plot_interval() == [t, 0, 1] + assert Line(p1, p10).plot_interval() == [t, -5, 5] + assert Ray((0, 0), angle=pi / 4).plot_interval() == [t, 0, 10] + + +def test_basic_properties_3d(): + p1 = Point3D(0, 0, 0) + p2 = Point3D(1, 1, 1) + p3 = Point3D(x1, x1, x1) + p5 = Point3D(x1, 1 + x1, 1) + + l1 = Line3D(p1, p2) + l3 = Line3D(p3, p5) + + r1 = Ray3D(p1, Point3D(-1, 5, 0)) + r3 = Ray3D(p1, p2) + + s1 = Segment3D(p1, p2) + + assert Line3D((1, 1, 1), direction_ratio=[2, 3, 4]) == Line3D(Point3D(1, 1, 1), Point3D(3, 4, 5)) + assert Line3D((1, 1, 1), direction_ratio=[1, 5, 7]) == Line3D(Point3D(1, 1, 1), Point3D(2, 6, 8)) + assert Line3D((1, 1, 1), direction_ratio=[1, 2, 3]) == Line3D(Point3D(1, 1, 1), Point3D(2, 3, 4)) + assert Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)).direction_cosine == [1, 0, 0] + assert Line3D(Line3D(p1, Point3D(0, 1, 0))) == Line3D(p1, Point3D(0, 1, 0)) + assert Ray3D(Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0))) == Ray3D(p1, Point3D(1, 0, 0)) + assert Line3D(p1, p2) != Line3D(p2, p1) + assert l1 != l3 + assert l1 != Line3D(p3, Point3D(y1, y1, y1)) + assert r3 != r1 + assert Ray3D(Point3D(0, 0, 0), Point3D(1, 1, 1)) in Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 2)) + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 2)) in Ray3D(Point3D(0, 0, 0), Point3D(1, 1, 1)) + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 2)).xdirection == S.Infinity + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 2)).ydirection == S.Infinity + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 2)).zdirection == S.Infinity + assert Ray3D(Point3D(0, 0, 0), Point3D(-2, 2, 2)).xdirection == S.NegativeInfinity + assert Ray3D(Point3D(0, 0, 0), Point3D(2, -2, 2)).ydirection == S.NegativeInfinity + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, -2)).zdirection == S.NegativeInfinity + assert Ray3D(Point3D(0, 0, 0), Point3D(0, 2, 2)).xdirection == S.Zero + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 0, 2)).ydirection == S.Zero + assert Ray3D(Point3D(0, 0, 0), Point3D(2, 2, 0)).zdirection == S.Zero + assert p1 in l1 + assert p1 not in l3 + + assert l1.direction_ratio == [1, 1, 1] + + assert s1.midpoint == Point3D(S.Half, S.Half, S.Half) + # Test zdirection + assert Ray3D(p1, Point3D(0, 0, -1)).zdirection is S.NegativeInfinity + + +def test_contains(): + p1 = Point(0, 0) + + r = Ray(p1, Point(4, 4)) + r1 = Ray3D(p1, Point3D(0, 0, -1)) + r2 = Ray3D(p1, Point3D(0, 1, 0)) + r3 = Ray3D(p1, Point3D(0, 0, 1)) + + l = Line(Point(0, 1), Point(3, 4)) + # Segment contains + assert Point(0, (a + b) / 2) in Segment((0, a), (0, b)) + assert Point((a + b) / 2, 0) in Segment((a, 0), (b, 0)) + assert Point3D(0, 1, 0) in Segment3D((0, 1, 0), (0, 1, 0)) + assert Point3D(1, 0, 0) in Segment3D((1, 0, 0), (1, 0, 0)) + assert Segment3D(Point3D(0, 0, 0), Point3D(1, 0, 0)).contains([]) is True + assert Segment3D(Point3D(0, 0, 0), Point3D(1, 0, 0)).contains( + Segment3D(Point3D(2, 2, 2), Point3D(3, 2, 2))) is False + # Line contains + assert l.contains(Point(0, 1)) is True + assert l.contains((0, 1)) is True + assert l.contains((0, 0)) is False + # Ray contains + assert r.contains(p1) is True + assert r.contains((1, 1)) is True + assert r.contains((1, 3)) is False + assert r.contains(Segment((1, 1), (2, 2))) is True + assert r.contains(Segment((1, 2), (2, 5))) is False + assert r.contains(Ray((2, 2), (3, 3))) is True + assert r.contains(Ray((2, 2), (3, 5))) is False + assert r1.contains(Segment3D(p1, Point3D(0, 0, -10))) is True + assert r1.contains(Segment3D(Point3D(1, 1, 1), Point3D(2, 2, 2))) is False + assert r2.contains(Point3D(0, 0, 0)) is True + assert r3.contains(Point3D(0, 0, 0)) is True + assert Ray3D(Point3D(1, 1, 1), Point3D(1, 0, 0)).contains([]) is False + assert Line3D((0, 0, 0), (x, y, z)).contains((2 * x, 2 * y, 2 * z)) + with warns(UserWarning, test_stacklevel=False): + assert Line3D(p1, Point3D(0, 1, 0)).contains(Point(1.0, 1.0)) is False + + with warns(UserWarning, test_stacklevel=False): + assert r3.contains(Point(1.0, 1.0)) is False + + +def test_contains_nonreal_symbols(): + u, v, w, z = symbols('u, v, w, z') + l = Segment(Point(u, w), Point(v, z)) + p = Point(u*Rational(2, 3) + v/3, w*Rational(2, 3) + z/3) + assert l.contains(p) + + +def test_distance_2d(): + p1 = Point(0, 0) + p2 = Point(1, 1) + half = S.Half + + s1 = Segment(Point(0, 0), Point(1, 1)) + s2 = Segment(Point(half, half), Point(1, 0)) + + r = Ray(p1, p2) + + assert s1.distance(Point(0, 0)) == 0 + assert s1.distance((0, 0)) == 0 + assert s2.distance(Point(0, 0)) == 2 ** half / 2 + assert s2.distance(Point(Rational(3) / 2, Rational(3) / 2)) == 2 ** half + assert Line(p1, p2).distance(Point(-1, 1)) == sqrt(2) + assert Line(p1, p2).distance(Point(1, -1)) == sqrt(2) + assert Line(p1, p2).distance(Point(2, 2)) == 0 + assert Line(p1, p2).distance((-1, 1)) == sqrt(2) + assert Line((0, 0), (0, 1)).distance(p1) == 0 + assert Line((0, 0), (0, 1)).distance(p2) == 1 + assert Line((0, 0), (1, 0)).distance(p1) == 0 + assert Line((0, 0), (1, 0)).distance(p2) == 1 + assert r.distance(Point(-1, -1)) == sqrt(2) + assert r.distance(Point(1, 1)) == 0 + assert r.distance(Point(-1, 1)) == sqrt(2) + assert Ray((1, 1), (2, 2)).distance(Point(1.5, 3)) == 3 * sqrt(2) / 4 + assert r.distance((1, 1)) == 0 + + +def test_dimension_normalization(): + with warns(UserWarning, test_stacklevel=False): + assert Ray((1, 1), (2, 1, 2)) == Ray((1, 1, 0), (2, 1, 2)) + + +def test_distance_3d(): + p1, p2 = Point3D(0, 0, 0), Point3D(1, 1, 1) + p3 = Point3D(Rational(3) / 2, Rational(3) / 2, Rational(3) / 2) + + s1 = Segment3D(Point3D(0, 0, 0), Point3D(1, 1, 1)) + s2 = Segment3D(Point3D(S.Half, S.Half, S.Half), Point3D(1, 0, 1)) + + r = Ray3D(p1, p2) + + assert s1.distance(p1) == 0 + assert s2.distance(p1) == sqrt(3) / 2 + assert s2.distance(p3) == 2 * sqrt(6) / 3 + assert s1.distance((0, 0, 0)) == 0 + assert s2.distance((0, 0, 0)) == sqrt(3) / 2 + assert s1.distance(p1) == 0 + assert s2.distance(p1) == sqrt(3) / 2 + assert s2.distance(p3) == 2 * sqrt(6) / 3 + assert s1.distance((0, 0, 0)) == 0 + assert s2.distance((0, 0, 0)) == sqrt(3) / 2 + # Line to point + assert Line3D(p1, p2).distance(Point3D(-1, 1, 1)) == 2 * sqrt(6) / 3 + assert Line3D(p1, p2).distance(Point3D(1, -1, 1)) == 2 * sqrt(6) / 3 + assert Line3D(p1, p2).distance(Point3D(2, 2, 2)) == 0 + assert Line3D(p1, p2).distance((2, 2, 2)) == 0 + assert Line3D(p1, p2).distance((1, -1, 1)) == 2 * sqrt(6) / 3 + assert Line3D((0, 0, 0), (0, 1, 0)).distance(p1) == 0 + assert Line3D((0, 0, 0), (0, 1, 0)).distance(p2) == sqrt(2) + assert Line3D((0, 0, 0), (1, 0, 0)).distance(p1) == 0 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(p2) == sqrt(2) + # Line to line + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Line3D((0, 0, 0), (0, 1, 2))) == 0 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Line3D((0, 0, 0), (1, 0, 0))) == 0 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Line3D((10, 0, 0), (10, 1, 2))) == 0 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Line3D((0, 1, 0), (0, 1, 1))) == 1 + # Line to plane + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Plane((2, 0, 0), (0, 0, 1))) == 0 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Plane((0, 1, 0), (0, 1, 0))) == 1 + assert Line3D((0, 0, 0), (1, 0, 0)).distance(Plane((1, 1, 3), (1, 0, 0))) == 0 + # Ray to point + assert r.distance(Point3D(-1, -1, -1)) == sqrt(3) + assert r.distance(Point3D(1, 1, 1)) == 0 + assert r.distance((-1, -1, -1)) == sqrt(3) + assert r.distance((1, 1, 1)) == 0 + assert Ray3D((0, 0, 0), (1, 1, 2)).distance((-1, -1, 2)) == 4 * sqrt(3) / 3 + assert Ray3D((1, 1, 1), (2, 2, 2)).distance(Point3D(1.5, -3, -1)) == Rational(9) / 2 + assert Ray3D((1, 1, 1), (2, 2, 2)).distance(Point3D(1.5, 3, 1)) == sqrt(78) / 6 + + +def test_equals(): + p1 = Point(0, 0) + p2 = Point(1, 1) + + l1 = Line(p1, p2) + l2 = Line((0, 5), slope=m) + l3 = Line(Point(x1, x1), Point(x1, 1 + x1)) + + assert l1.perpendicular_line(p1.args).equals(Line(Point(0, 0), Point(1, -1))) + assert l1.perpendicular_line(p1).equals(Line(Point(0, 0), Point(1, -1))) + assert Line(Point(x1, x1), Point(y1, y1)).parallel_line(Point(-x1, x1)). \ + equals(Line(Point(-x1, x1), Point(-y1, 2 * x1 - y1))) + assert l3.parallel_line(p1.args).equals(Line(Point(0, 0), Point(0, -1))) + assert l3.parallel_line(p1).equals(Line(Point(0, 0), Point(0, -1))) + assert (l2.distance(Point(2, 3)) - 2 * abs(m + 1) / sqrt(m ** 2 + 1)).equals(0) + assert Line3D(p1, Point3D(0, 1, 0)).equals(Point(1.0, 1.0)) is False + assert Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)).equals(Line3D(Point3D(-5, 0, 0), Point3D(-1, 0, 0))) is True + assert Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)).equals(Line3D(p1, Point3D(0, 1, 0))) is False + assert Ray3D(p1, Point3D(0, 0, -1)).equals(Point(1.0, 1.0)) is False + assert Ray3D(p1, Point3D(0, 0, -1)).equals(Ray3D(p1, Point3D(0, 0, -1))) is True + assert Line3D((0, 0), (t, t)).perpendicular_line(Point(0, 1, 0)).equals( + Line3D(Point3D(0, 1, 0), Point3D(S.Half, S.Half, 0))) + assert Line3D((0, 0), (t, t)).perpendicular_segment(Point(0, 1, 0)).equals(Segment3D((0, 1), (S.Half, S.Half))) + assert Line3D(p1, Point3D(0, 1, 0)).equals(Point(1.0, 1.0)) is False + + +def test_equation(): + p1 = Point(0, 0) + p2 = Point(1, 1) + l1 = Line(p1, p2) + l3 = Line(Point(x1, x1), Point(x1, 1 + x1)) + + assert simplify(l1.equation()) in (x - y, y - x) + assert simplify(l3.equation()) in (x - x1, x1 - x) + assert simplify(l1.equation()) in (x - y, y - x) + assert simplify(l3.equation()) in (x - x1, x1 - x) + + assert Line(p1, Point(1, 0)).equation(x=x, y=y) == y + assert Line(p1, Point(0, 1)).equation() == x + assert Line(Point(2, 0), Point(2, 1)).equation() == x - 2 + assert Line(p2, Point(2, 1)).equation() == y - 1 + + assert Line3D(Point(x1, x1, x1), Point(y1, y1, y1) + ).equation() == (-x + y, -x + z) + assert Line3D(Point(1, 2, 3), Point(2, 3, 4) + ).equation() == (-x + y - 1, -x + z - 2) + assert Line3D(Point(1, 2, 3), Point(1, 3, 4) + ).equation() == (x - 1, -y + z - 1) + assert Line3D(Point(1, 2, 3), Point(2, 2, 4) + ).equation() == (y - 2, -x + z - 2) + assert Line3D(Point(1, 2, 3), Point(2, 3, 3) + ).equation() == (-x + y - 1, z - 3) + assert Line3D(Point(1, 2, 3), Point(1, 2, 4) + ).equation() == (x - 1, y - 2) + assert Line3D(Point(1, 2, 3), Point(1, 3, 3) + ).equation() == (x - 1, z - 3) + assert Line3D(Point(1, 2, 3), Point(2, 2, 3) + ).equation() == (y - 2, z - 3) + + +def test_intersection_2d(): + p1 = Point(0, 0) + p2 = Point(1, 1) + p3 = Point(x1, x1) + p4 = Point(y1, y1) + + l1 = Line(p1, p2) + l3 = Line(Point(0, 0), Point(3, 4)) + + r1 = Ray(Point(1, 1), Point(2, 2)) + r2 = Ray(Point(0, 0), Point(3, 4)) + r4 = Ray(p1, p2) + r6 = Ray(Point(0, 1), Point(1, 2)) + r7 = Ray(Point(0.5, 0.5), Point(1, 1)) + + s1 = Segment(p1, p2) + s2 = Segment(Point(0.25, 0.25), Point(0.5, 0.5)) + s3 = Segment(Point(0, 0), Point(3, 4)) + + assert intersection(l1, p1) == [p1] + assert intersection(l1, Point(x1, 1 + x1)) == [] + assert intersection(l1, Line(p3, p4)) in [[l1], [Line(p3, p4)]] + assert intersection(l1, l1.parallel_line(Point(x1, 1 + x1))) == [] + assert intersection(l3, l3) == [l3] + assert intersection(l3, r2) == [r2] + assert intersection(l3, s3) == [s3] + assert intersection(s3, l3) == [s3] + assert intersection(Segment(Point(-10, 10), Point(10, 10)), Segment(Point(-5, -5), Point(-5, 5))) == [] + assert intersection(r2, l3) == [r2] + assert intersection(r1, Ray(Point(2, 2), Point(0, 0))) == [Segment(Point(1, 1), Point(2, 2))] + assert intersection(r1, Ray(Point(1, 1), Point(-1, -1))) == [Point(1, 1)] + assert intersection(r1, Segment(Point(0, 0), Point(2, 2))) == [Segment(Point(1, 1), Point(2, 2))] + + assert r4.intersection(s2) == [s2] + assert r4.intersection(Segment(Point(2, 3), Point(3, 4))) == [] + assert r4.intersection(Segment(Point(-1, -1), Point(0.5, 0.5))) == [Segment(p1, Point(0.5, 0.5))] + assert r4.intersection(Ray(p2, p1)) == [s1] + assert Ray(p2, p1).intersection(r6) == [] + assert r4.intersection(r7) == r7.intersection(r4) == [r7] + assert Ray3D((0, 0), (3, 0)).intersection(Ray3D((1, 0), (3, 0))) == [Ray3D((1, 0), (3, 0))] + assert Ray3D((1, 0), (3, 0)).intersection(Ray3D((0, 0), (3, 0))) == [Ray3D((1, 0), (3, 0))] + assert Ray(Point(0, 0), Point(0, 4)).intersection(Ray(Point(0, 1), Point(0, -1))) == \ + [Segment(Point(0, 0), Point(0, 1))] + + assert Segment3D((0, 0), (3, 0)).intersection( + Segment3D((1, 0), (2, 0))) == [Segment3D((1, 0), (2, 0))] + assert Segment3D((1, 0), (2, 0)).intersection( + Segment3D((0, 0), (3, 0))) == [Segment3D((1, 0), (2, 0))] + assert Segment3D((0, 0), (3, 0)).intersection( + Segment3D((3, 0), (4, 0))) == [Point3D((3, 0))] + assert Segment3D((0, 0), (3, 0)).intersection( + Segment3D((2, 0), (5, 0))) == [Segment3D((2, 0), (3, 0))] + assert Segment3D((0, 0), (3, 0)).intersection( + Segment3D((-2, 0), (1, 0))) == [Segment3D((0, 0), (1, 0))] + assert Segment3D((0, 0), (3, 0)).intersection( + Segment3D((-2, 0), (0, 0))) == [Point3D(0, 0)] + assert s1.intersection(Segment(Point(1, 1), Point(2, 2))) == [Point(1, 1)] + assert s1.intersection(Segment(Point(0.5, 0.5), Point(1.5, 1.5))) == [Segment(Point(0.5, 0.5), p2)] + assert s1.intersection(Segment(Point(4, 4), Point(5, 5))) == [] + assert s1.intersection(Segment(Point(-1, -1), p1)) == [p1] + assert s1.intersection(Segment(Point(-1, -1), Point(0.5, 0.5))) == [Segment(p1, Point(0.5, 0.5))] + assert s1.intersection(Line(Point(1, 0), Point(2, 1))) == [] + assert s1.intersection(s2) == [s2] + assert s2.intersection(s1) == [s2] + + assert asa(120, 8, 52) == \ + Triangle( + Point(0, 0), + Point(8, 0), + Point(-4 * cos(19 * pi / 90) / sin(2 * pi / 45), + 4 * sqrt(3) * cos(19 * pi / 90) / sin(2 * pi / 45))) + assert Line((0, 0), (1, 1)).intersection(Ray((1, 0), (1, 2))) == [Point(1, 1)] + assert Line((0, 0), (1, 1)).intersection(Segment((1, 0), (1, 2))) == [Point(1, 1)] + assert Ray((0, 0), (1, 1)).intersection(Ray((1, 0), (1, 2))) == [Point(1, 1)] + assert Ray((0, 0), (1, 1)).intersection(Segment((1, 0), (1, 2))) == [Point(1, 1)] + assert Ray((0, 0), (10, 10)).contains(Segment((1, 1), (2, 2))) is True + assert Segment((1, 1), (2, 2)) in Line((0, 0), (10, 10)) + assert s1.intersection(Ray((1, 1), (4, 4))) == [Point(1, 1)] + + # This test is disabled because it hangs after rref changes which simplify + # intermediate results and return a different representation from when the + # test was written. + # # 16628 - this should be fast + # p0 = Point2D(Rational(249, 5), Rational(497999, 10000)) + # p1 = Point2D((-58977084786*sqrt(405639795226) + 2030690077184193 + + # 20112207807*sqrt(630547164901) + 99600*sqrt(255775022850776494562626)) + # /(2000*sqrt(255775022850776494562626) + 1991998000*sqrt(405639795226) + # + 1991998000*sqrt(630547164901) + 1622561172902000), + # (-498000*sqrt(255775022850776494562626) - 995999*sqrt(630547164901) + + # 90004251917891999 + + # 496005510002*sqrt(405639795226))/(10000*sqrt(255775022850776494562626) + # + 9959990000*sqrt(405639795226) + 9959990000*sqrt(630547164901) + + # 8112805864510000)) + # p2 = Point2D(Rational(497, 10), Rational(-497, 10)) + # p3 = Point2D(Rational(-497, 10), Rational(-497, 10)) + # l = Line(p0, p1) + # s = Segment(p2, p3) + # n = (-52673223862*sqrt(405639795226) - 15764156209307469 - + # 9803028531*sqrt(630547164901) + + # 33200*sqrt(255775022850776494562626)) + # d = sqrt(405639795226) + 315274080450 + 498000*sqrt( + # 630547164901) + sqrt(255775022850776494562626) + # assert intersection(l, s) == [ + # Point2D(n/d*Rational(3, 2000), Rational(-497, 10))] + + +def test_line_intersection(): + # see also test_issue_11238 in test_matrices.py + x0 = tan(pi*Rational(13, 45)) + x1 = sqrt(3) + x2 = x0**2 + x, y = [8*x0/(x0 + x1), (24*x0 - 8*x1*x2)/(x2 - 3)] + assert Line(Point(0, 0), Point(1, -sqrt(3))).contains(Point(x, y)) is True + + +def test_intersection_3d(): + p1 = Point3D(0, 0, 0) + p2 = Point3D(1, 1, 1) + + l1 = Line3D(p1, p2) + l2 = Line3D(Point3D(0, 0, 0), Point3D(3, 4, 0)) + + r1 = Ray3D(Point3D(1, 1, 1), Point3D(2, 2, 2)) + r2 = Ray3D(Point3D(0, 0, 0), Point3D(3, 4, 0)) + + s1 = Segment3D(Point3D(0, 0, 0), Point3D(3, 4, 0)) + + assert intersection(l1, p1) == [p1] + assert intersection(l1, Point3D(x1, 1 + x1, 1)) == [] + assert intersection(l1, l1.parallel_line(p1)) == [Line3D(Point3D(0, 0, 0), Point3D(1, 1, 1))] + assert intersection(l2, r2) == [r2] + assert intersection(l2, s1) == [s1] + assert intersection(r2, l2) == [r2] + assert intersection(r1, Ray3D(Point3D(1, 1, 1), Point3D(-1, -1, -1))) == [Point3D(1, 1, 1)] + assert intersection(r1, Segment3D(Point3D(0, 0, 0), Point3D(2, 2, 2))) == [ + Segment3D(Point3D(1, 1, 1), Point3D(2, 2, 2))] + assert intersection(Ray3D(Point3D(1, 0, 0), Point3D(-1, 0, 0)), Ray3D(Point3D(0, 1, 0), Point3D(0, -1, 0))) \ + == [Point3D(0, 0, 0)] + assert intersection(r1, Ray3D(Point3D(2, 2, 2), Point3D(0, 0, 0))) == \ + [Segment3D(Point3D(1, 1, 1), Point3D(2, 2, 2))] + assert intersection(s1, r2) == [s1] + + assert Line3D(Point3D(4, 0, 1), Point3D(0, 4, 1)).intersection(Line3D(Point3D(0, 0, 1), Point3D(4, 4, 1))) == \ + [Point3D(2, 2, 1)] + assert Line3D((0, 1, 2), (0, 2, 3)).intersection(Line3D((0, 1, 2), (0, 1, 1))) == [Point3D(0, 1, 2)] + assert Line3D((0, 0), (t, t)).intersection(Line3D((0, 1), (t, t))) == \ + [Point3D(t, t)] + + assert Ray3D(Point3D(0, 0, 0), Point3D(0, 4, 0)).intersection(Ray3D(Point3D(0, 1, 1), Point3D(0, -1, 1))) == [] + + +def test_is_parallel(): + p1 = Point3D(0, 0, 0) + p2 = Point3D(1, 1, 1) + p3 = Point3D(x1, x1, x1) + + l2 = Line(Point(x1, x1), Point(y1, y1)) + l2_1 = Line(Point(x1, x1), Point(x1, 1 + x1)) + + assert Line.is_parallel(Line(Point(0, 0), Point(1, 1)), l2) + assert Line.is_parallel(l2, Line(Point(x1, x1), Point(x1, 1 + x1))) is False + assert Line.is_parallel(l2, l2.parallel_line(Point(-x1, x1))) + assert Line.is_parallel(l2_1, l2_1.parallel_line(Point(0, 0))) + assert Line3D(p1, p2).is_parallel(Line3D(p1, p2)) # same as in 2D + assert Line3D(Point3D(4, 0, 1), Point3D(0, 4, 1)).is_parallel(Line3D(Point3D(0, 0, 1), Point3D(4, 4, 1))) is False + assert Line3D(p1, p2).parallel_line(p3) == Line3D(Point3D(x1, x1, x1), + Point3D(x1 + 1, x1 + 1, x1 + 1)) + assert Line3D(p1, p2).parallel_line(p3.args) == \ + Line3D(Point3D(x1, x1, x1), Point3D(x1 + 1, x1 + 1, x1 + 1)) + assert Line3D(Point3D(4, 0, 1), Point3D(0, 4, 1)).is_parallel(Line3D(Point3D(0, 0, 1), Point3D(4, 4, 1))) is False + + +def test_is_perpendicular(): + p1 = Point(0, 0) + p2 = Point(1, 1) + + l1 = Line(p1, p2) + l2 = Line(Point(x1, x1), Point(y1, y1)) + l1_1 = Line(p1, Point(-x1, x1)) + # 2D + assert Line.is_perpendicular(l1, l1_1) + assert Line.is_perpendicular(l1, l2) is False + p = l1.random_point() + assert l1.perpendicular_segment(p) == p + # 3D + assert Line3D.is_perpendicular(Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)), + Line3D(Point3D(0, 0, 0), Point3D(0, 1, 0))) is True + assert Line3D.is_perpendicular(Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)), + Line3D(Point3D(0, 1, 0), Point3D(1, 1, 0))) is False + assert Line3D.is_perpendicular(Line3D(Point3D(0, 0, 0), Point3D(1, 1, 1)), + Line3D(Point3D(x1, x1, x1), Point3D(y1, y1, y1))) is False + + +def test_is_similar(): + p1 = Point(2000, 2000) + p2 = p1.scale(2, 2) + + r1 = Ray3D(Point3D(1, 1, 1), Point3D(1, 0, 0)) + r2 = Ray(Point(0, 0), Point(0, 1)) + + s1 = Segment(Point(0, 0), p1) + + assert s1.is_similar(Segment(p1, p2)) + assert s1.is_similar(r2) is False + assert r1.is_similar(Line3D(Point3D(1, 1, 1), Point3D(1, 0, 0))) is True + assert r1.is_similar(Line3D(Point3D(0, 0, 0), Point3D(0, 1, 0))) is False + + +def test_length(): + s2 = Segment3D(Point3D(x1, x1, x1), Point3D(y1, y1, y1)) + assert Line(Point(0, 0), Point(1, 1)).length is oo + assert s2.length == sqrt(3) * sqrt((x1 - y1) ** 2) + assert Line3D(Point3D(0, 0, 0), Point3D(1, 1, 1)).length is oo + + +def test_projection(): + p1 = Point(0, 0) + p2 = Point3D(0, 0, 0) + p3 = Point(-x1, x1) + + l1 = Line(p1, Point(1, 1)) + l2 = Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)) + l3 = Line3D(p2, Point3D(1, 1, 1)) + + r1 = Ray(Point(1, 1), Point(2, 2)) + + s1 = Segment(Point2D(0, 0), Point2D(0, 1)) + s2 = Segment(Point2D(1, 0), Point2D(2, 1/2)) + + assert Line(Point(x1, x1), Point(y1, y1)).projection(Point(y1, y1)) == Point(y1, y1) + assert Line(Point(x1, x1), Point(x1, 1 + x1)).projection(Point(1, 1)) == Point(x1, 1) + assert Segment(Point(-2, 2), Point(0, 4)).projection(r1) == Segment(Point(-1, 3), Point(0, 4)) + assert Segment(Point(0, 4), Point(-2, 2)).projection(r1) == Segment(Point(0, 4), Point(-1, 3)) + assert s2.projection(s1) == EmptySet + assert l1.projection(p3) == p1 + assert l1.projection(Ray(p1, Point(-1, 5))) == Ray(Point(0, 0), Point(2, 2)) + assert l1.projection(Ray(p1, Point(-1, 1))) == p1 + assert r1.projection(Ray(Point(1, 1), Point(-1, -1))) == Point(1, 1) + assert r1.projection(Ray(Point(0, 4), Point(-1, -5))) == Segment(Point(1, 1), Point(2, 2)) + assert r1.projection(Segment(Point(-1, 5), Point(-5, -10))) == Segment(Point(1, 1), Point(2, 2)) + assert r1.projection(Ray(Point(1, 1), Point(-1, -1))) == Point(1, 1) + assert r1.projection(Ray(Point(0, 4), Point(-1, -5))) == Segment(Point(1, 1), Point(2, 2)) + assert r1.projection(Segment(Point(-1, 5), Point(-5, -10))) == Segment(Point(1, 1), Point(2, 2)) + + assert l3.projection(Ray3D(p2, Point3D(-1, 5, 0))) == Ray3D(Point3D(0, 0, 0), Point3D(Rational(4, 3), Rational(4, 3), Rational(4, 3))) + assert l3.projection(Ray3D(p2, Point3D(-1, 1, 1))) == Ray3D(Point3D(0, 0, 0), Point3D(Rational(1, 3), Rational(1, 3), Rational(1, 3))) + assert l2.projection(Point3D(5, 5, 0)) == Point3D(5, 0) + assert l2.projection(Line3D(Point3D(0, 1, 0), Point3D(1, 1, 0))).equals(l2) + + +def test_perpendicular_line(): + # 3d - requires a particular orthogonal to be selected + p1, p2, p3 = Point(0, 0, 0), Point(2, 3, 4), Point(-2, 2, 0) + l = Line(p1, p2) + p = l.perpendicular_line(p3) + assert p.p1 == p3 + assert p.p2 in l + # 2d - does not require special selection + p1, p2, p3 = Point(0, 0), Point(2, 3), Point(-2, 2) + l = Line(p1, p2) + p = l.perpendicular_line(p3) + assert p.p1 == p3 + # p is directed from l to p3 + assert p.direction.unit == (p3 - l.projection(p3)).unit + + +def test_perpendicular_bisector(): + s1 = Segment(Point(0, 0), Point(1, 1)) + aline = Line(Point(S.Half, S.Half), Point(Rational(3, 2), Rational(-1, 2))) + on_line = Segment(Point(S.Half, S.Half), Point(Rational(3, 2), Rational(-1, 2))).midpoint + + assert s1.perpendicular_bisector().equals(aline) + assert s1.perpendicular_bisector(on_line).equals(Segment(s1.midpoint, on_line)) + assert s1.perpendicular_bisector(on_line + (1, 0)).equals(aline) + + +def test_raises(): + d, e = symbols('a,b', real=True) + s = Segment((d, 0), (e, 0)) + + raises(TypeError, lambda: Line((1, 1), 1)) + raises(ValueError, lambda: Line(Point(0, 0), Point(0, 0))) + raises(Undecidable, lambda: Point(2 * d, 0) in s) + raises(ValueError, lambda: Ray3D(Point(1.0, 1.0))) + raises(ValueError, lambda: Line3D(Point3D(0, 0, 0), Point3D(0, 0, 0))) + raises(TypeError, lambda: Line3D((1, 1), 1)) + raises(ValueError, lambda: Line3D(Point3D(0, 0, 0))) + raises(TypeError, lambda: Ray((1, 1), 1)) + raises(GeometryError, lambda: Line(Point(0, 0), Point(1, 0)) + .projection(Circle(Point(0, 0), 1))) + + +def test_ray_generation(): + assert Ray((1, 1), angle=pi / 4) == Ray((1, 1), (2, 2)) + assert Ray((1, 1), angle=pi / 2) == Ray((1, 1), (1, 2)) + assert Ray((1, 1), angle=-pi / 2) == Ray((1, 1), (1, 0)) + assert Ray((1, 1), angle=-3 * pi / 2) == Ray((1, 1), (1, 2)) + assert Ray((1, 1), angle=5 * pi / 2) == Ray((1, 1), (1, 2)) + assert Ray((1, 1), angle=5.0 * pi / 2) == Ray((1, 1), (1, 2)) + assert Ray((1, 1), angle=pi) == Ray((1, 1), (0, 1)) + assert Ray((1, 1), angle=3.0 * pi) == Ray((1, 1), (0, 1)) + assert Ray((1, 1), angle=4.0 * pi) == Ray((1, 1), (2, 1)) + assert Ray((1, 1), angle=0) == Ray((1, 1), (2, 1)) + assert Ray((1, 1), angle=4.05 * pi) == Ray(Point(1, 1), + Point(2, -sqrt(5) * sqrt(2 * sqrt(5) + 10) / 4 - sqrt( + 2 * sqrt(5) + 10) / 4 + 2 + sqrt(5))) + assert Ray((1, 1), angle=4.02 * pi) == Ray(Point(1, 1), + Point(2, 1 + tan(4.02 * pi))) + assert Ray((1, 1), angle=5) == Ray((1, 1), (2, 1 + tan(5))) + + assert Ray3D((1, 1, 1), direction_ratio=[4, 4, 4]) == Ray3D(Point3D(1, 1, 1), Point3D(5, 5, 5)) + assert Ray3D((1, 1, 1), direction_ratio=[1, 2, 3]) == Ray3D(Point3D(1, 1, 1), Point3D(2, 3, 4)) + assert Ray3D((1, 1, 1), direction_ratio=[1, 1, 1]) == Ray3D(Point3D(1, 1, 1), Point3D(2, 2, 2)) + + +def test_issue_7814(): + circle = Circle(Point(x, 0), y) + line = Line(Point(k, z), slope=0) + _s = sqrt((y - z)*(y + z)) + assert line.intersection(circle) == [Point2D(x + _s, z), Point2D(x - _s, z)] + + +def test_issue_2941(): + def _check(): + for f, g in cartes(*[(Line, Ray, Segment)] * 2): + l1 = f(a, b) + l2 = g(c, d) + assert l1.intersection(l2) == l2.intersection(l1) + # intersect at end point + c, d = (-2, -2), (-2, 0) + a, b = (0, 0), (1, 1) + _check() + # midline intersection + c, d = (-2, -3), (-2, 0) + _check() + + +def test_parameter_value(): + t = Symbol('t') + p1, p2 = Point(0, 1), Point(5, 6) + l = Line(p1, p2) + assert l.parameter_value((5, 6), t) == {t: 1} + raises(ValueError, lambda: l.parameter_value((0, 0), t)) + + +def test_bisectors(): + r1 = Line3D(Point3D(0, 0, 0), Point3D(1, 0, 0)) + r2 = Line3D(Point3D(0, 0, 0), Point3D(0, 1, 0)) + bisections = r1.bisectors(r2) + assert bisections == [Line3D(Point3D(0, 0, 0), Point3D(1, 1, 0)), + Line3D(Point3D(0, 0, 0), Point3D(1, -1, 0))] + ans = [Line3D(Point3D(0, 0, 0), Point3D(1, 0, 1)), + Line3D(Point3D(0, 0, 0), Point3D(-1, 0, 1))] + l1 = (0, 0, 0), (0, 0, 1) + l2 = (0, 0), (1, 0) + for a, b in cartes((Line, Segment, Ray), repeat=2): + assert a(*l1).bisectors(b(*l2)) == ans + + +def test_issue_8615(): + a = Line3D(Point3D(6, 5, 0), Point3D(6, -6, 0)) + b = Line3D(Point3D(6, -1, 19/10), Point3D(6, -1, 0)) + assert a.intersection(b) == [Point3D(6, -1, 0)] + + +def test_issue_12598(): + r1 = Ray(Point(0, 1), Point(0.98, 0.79).n(2)) + r2 = Ray(Point(0, 0), Point(0.71, 0.71).n(2)) + assert str(r1.intersection(r2)[0]) == 'Point2D(0.82, 0.82)' + l1 = Line((0, 0), (1, 1)) + l2 = Segment((-1, 1), (0, -1)).n(2) + assert str(l1.intersection(l2)[0]) == 'Point2D(-0.33, -0.33)' + l2 = Segment((-1, 1), (-1/2, 1/2)).n(2) + assert not l1.intersection(l2) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_parabola.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_parabola.py new file mode 100644 index 0000000000000000000000000000000000000000..2a683f26619952d93475aca9ebd3d47cfb3657a6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_parabola.py @@ -0,0 +1,143 @@ +from sympy.core.numbers import (Rational, oo) +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.complexes import sign +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.geometry.ellipse import (Circle, Ellipse) +from sympy.geometry.line import (Line, Ray2D, Segment2D) +from sympy.geometry.parabola import Parabola +from sympy.geometry.point import (Point, Point2D) +from sympy.testing.pytest import raises + +from sympy.abc import x, y + +def test_parabola_geom(): + a, b = symbols('a b') + p1 = Point(0, 0) + p2 = Point(3, 7) + p3 = Point(0, 4) + p4 = Point(6, 0) + p5 = Point(a, a) + d1 = Line(Point(4, 0), Point(4, 9)) + d2 = Line(Point(7, 6), Point(3, 6)) + d3 = Line(Point(4, 0), slope=oo) + d4 = Line(Point(7, 6), slope=0) + d5 = Line(Point(b, a), slope=oo) + d6 = Line(Point(a, b), slope=0) + + half = S.Half + + pa1 = Parabola(None, d2) + pa2 = Parabola(directrix=d1) + pa3 = Parabola(p1, d1) + pa4 = Parabola(p2, d2) + pa5 = Parabola(p2, d4) + pa6 = Parabola(p3, d2) + pa7 = Parabola(p2, d1) + pa8 = Parabola(p4, d1) + pa9 = Parabola(p4, d3) + pa10 = Parabola(p5, d5) + pa11 = Parabola(p5, d6) + d = Line(Point(3, 7), Point(2, 9)) + pa12 = Parabola(Point(7, 8), d) + pa12r = Parabola(Point(7, 8).reflect(d), d) + + raises(ValueError, lambda: + Parabola(Point(7, 8, 9), Line(Point(6, 7), Point(7, 7)))) + raises(ValueError, lambda: + Parabola(Point(0, 2), Line(Point(7, 2), Point(6, 2)))) + raises(ValueError, lambda: Parabola(Point(7, 8), Point(3, 8))) + + # Basic Stuff + assert pa1.focus == Point(0, 0) + assert pa1.ambient_dimension == S(2) + assert pa2 == pa3 + assert pa4 != pa7 + assert pa6 != pa7 + assert pa6.focus == Point2D(0, 4) + assert pa6.focal_length == 1 + assert pa6.p_parameter == -1 + assert pa6.vertex == Point2D(0, 5) + assert pa6.eccentricity == 1 + assert pa7.focus == Point2D(3, 7) + assert pa7.focal_length == half + assert pa7.p_parameter == -half + assert pa7.vertex == Point2D(7*half, 7) + assert pa4.focal_length == half + assert pa4.p_parameter == half + assert pa4.vertex == Point2D(3, 13*half) + assert pa8.focal_length == 1 + assert pa8.p_parameter == 1 + assert pa8.vertex == Point2D(5, 0) + assert pa4.focal_length == pa5.focal_length + assert pa4.p_parameter == pa5.p_parameter + assert pa4.vertex == pa5.vertex + assert pa4.equation() == pa5.equation() + assert pa8.focal_length == pa9.focal_length + assert pa8.p_parameter == pa9.p_parameter + assert pa8.vertex == pa9.vertex + assert pa8.equation() == pa9.equation() + assert pa10.focal_length == pa11.focal_length == sqrt((a - b) ** 2) / 2 # if a, b real == abs(a - b)/2 + assert pa11.vertex == Point(*pa10.vertex[::-1]) == Point(a, + a - sqrt((a - b)**2)*sign(a - b)/2) # change axis x->y, y->x on pa10 + aos = pa12.axis_of_symmetry + assert aos == Line(Point(7, 8), Point(5, 7)) + assert pa12.directrix == Line(Point(3, 7), Point(2, 9)) + assert pa12.directrix.angle_between(aos) == S.Pi/2 + assert pa12.eccentricity == 1 + assert pa12.equation(x, y) == (x - 7)**2 + (y - 8)**2 - (-2*x - y + 13)**2/5 + assert pa12.focal_length == 9*sqrt(5)/10 + assert pa12.focus == Point(7, 8) + assert pa12.p_parameter == 9*sqrt(5)/10 + assert pa12.vertex == Point2D(S(26)/5, S(71)/10) + assert pa12r.focal_length == 9*sqrt(5)/10 + assert pa12r.focus == Point(-S(1)/5, S(22)/5) + assert pa12r.p_parameter == -9*sqrt(5)/10 + assert pa12r.vertex == Point(S(8)/5, S(53)/10) + + +def test_parabola_intersection(): + l1 = Line(Point(1, -2), Point(-1,-2)) + l2 = Line(Point(1, 2), Point(-1,2)) + l3 = Line(Point(1, 0), Point(-1,0)) + + p1 = Point(0,0) + p2 = Point(0, -2) + p3 = Point(120, -12) + parabola1 = Parabola(p1, l1) + + # parabola with parabola + assert parabola1.intersection(parabola1) == [parabola1] + assert parabola1.intersection(Parabola(p1, l2)) == [Point2D(-2, 0), Point2D(2, 0)] + assert parabola1.intersection(Parabola(p2, l3)) == [Point2D(0, -1)] + assert parabola1.intersection(Parabola(Point(16, 0), l1)) == [Point2D(8, 15)] + assert parabola1.intersection(Parabola(Point(0, 16), l1)) == [Point2D(-6, 8), Point2D(6, 8)] + assert parabola1.intersection(Parabola(p3, l3)) == [] + # parabola with point + assert parabola1.intersection(p1) == [] + assert parabola1.intersection(Point2D(0, -1)) == [Point2D(0, -1)] + assert parabola1.intersection(Point2D(4, 3)) == [Point2D(4, 3)] + # parabola with line + assert parabola1.intersection(Line(Point2D(-7, 3), Point(12, 3))) == [Point2D(-4, 3), Point2D(4, 3)] + assert parabola1.intersection(Line(Point(-4, -1), Point(4, -1))) == [Point(0, -1)] + assert parabola1.intersection(Line(Point(2, 0), Point(0, -2))) == [Point2D(2, 0)] + raises(TypeError, lambda: parabola1.intersection(Line(Point(0, 0, 0), Point(1, 1, 1)))) + # parabola with segment + assert parabola1.intersection(Segment2D((-4, -5), (4, 3))) == [Point2D(0, -1), Point2D(4, 3)] + assert parabola1.intersection(Segment2D((0, -5), (0, 6))) == [Point2D(0, -1)] + assert parabola1.intersection(Segment2D((-12, -65), (14, -68))) == [] + # parabola with ray + assert parabola1.intersection(Ray2D((-4, -5), (4, 3))) == [Point2D(0, -1), Point2D(4, 3)] + assert parabola1.intersection(Ray2D((0, 7), (1, 14))) == [Point2D(14 + 2*sqrt(57), 105 + 14*sqrt(57))] + assert parabola1.intersection(Ray2D((0, 7), (0, 14))) == [] + # parabola with ellipse/circle + assert parabola1.intersection(Circle(p1, 2)) == [Point2D(-2, 0), Point2D(2, 0)] + assert parabola1.intersection(Circle(p2, 1)) == [Point2D(0, -1)] + assert parabola1.intersection(Ellipse(p2, 2, 1)) == [Point2D(0, -1)] + assert parabola1.intersection(Ellipse(Point(0, 19), 5, 7)) == [] + assert parabola1.intersection(Ellipse((0, 3), 12, 4)) == [ + Point2D(0, -1), + Point2D(-4*sqrt(17)/3, Rational(59, 9)), + Point2D(4*sqrt(17)/3, Rational(59, 9))] + # parabola with unsupported type + raises(TypeError, lambda: parabola1.intersection(2)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_plane.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_plane.py new file mode 100644 index 0000000000000000000000000000000000000000..1010fce5c3bc68348eacee13f29c1d7588f17e39 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_plane.py @@ -0,0 +1,268 @@ +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (asin, cos, sin) +from sympy.geometry import Line, Point, Ray, Segment, Point3D, Line3D, Ray3D, Segment3D, Plane, Circle +from sympy.geometry.util import are_coplanar +from sympy.testing.pytest import raises + + +def test_plane(): + x, y, z, u, v = symbols('x y z u v', real=True) + p1 = Point3D(0, 0, 0) + p2 = Point3D(1, 1, 1) + p3 = Point3D(1, 2, 3) + pl3 = Plane(p1, p2, p3) + pl4 = Plane(p1, normal_vector=(1, 1, 1)) + pl4b = Plane(p1, p2) + pl5 = Plane(p3, normal_vector=(1, 2, 3)) + pl6 = Plane(Point3D(2, 3, 7), normal_vector=(2, 2, 2)) + pl7 = Plane(Point3D(1, -5, -6), normal_vector=(1, -2, 1)) + pl8 = Plane(p1, normal_vector=(0, 0, 1)) + pl9 = Plane(p1, normal_vector=(0, 12, 0)) + pl10 = Plane(p1, normal_vector=(-2, 0, 0)) + pl11 = Plane(p2, normal_vector=(0, 0, 1)) + l1 = Line3D(Point3D(5, 0, 0), Point3D(1, -1, 1)) + l2 = Line3D(Point3D(0, -2, 0), Point3D(3, 1, 1)) + l3 = Line3D(Point3D(0, -1, 0), Point3D(5, -1, 9)) + + raises(ValueError, lambda: Plane(p1, p1, p1)) + + assert Plane(p1, p2, p3) != Plane(p1, p3, p2) + assert Plane(p1, p2, p3).is_coplanar(Plane(p1, p3, p2)) + assert Plane(p1, p2, p3).is_coplanar(p1) + assert Plane(p1, p2, p3).is_coplanar(Circle(p1, 1)) is False + assert Plane(p1, normal_vector=(0, 0, 1)).is_coplanar(Circle(p1, 1)) + + assert pl3 == Plane(Point3D(0, 0, 0), normal_vector=(1, -2, 1)) + assert pl3 != pl4 + assert pl4 == pl4b + assert pl5 == Plane(Point3D(1, 2, 3), normal_vector=(1, 2, 3)) + + assert pl5.equation(x, y, z) == x + 2*y + 3*z - 14 + assert pl3.equation(x, y, z) == x - 2*y + z + + assert pl3.p1 == p1 + assert pl4.p1 == p1 + assert pl5.p1 == p3 + + assert pl4.normal_vector == (1, 1, 1) + assert pl5.normal_vector == (1, 2, 3) + + assert p1 in pl3 + assert p1 in pl4 + assert p3 in pl5 + + assert pl3.projection(Point(0, 0)) == p1 + p = pl3.projection(Point3D(1, 1, 0)) + assert p == Point3D(Rational(7, 6), Rational(2, 3), Rational(1, 6)) + assert p in pl3 + + l = pl3.projection_line(Line(Point(0, 0), Point(1, 1))) + assert l == Line3D(Point3D(0, 0, 0), Point3D(Rational(7, 6), Rational(2, 3), Rational(1, 6))) + assert l in pl3 + # get a segment that does not intersect the plane which is also + # parallel to pl3's normal veector + t = Dummy() + r = pl3.random_point() + a = pl3.perpendicular_line(r).arbitrary_point(t) + s = Segment3D(a.subs(t, 1), a.subs(t, 2)) + assert s.p1 not in pl3 and s.p2 not in pl3 + assert pl3.projection_line(s).equals(r) + assert pl3.projection_line(Segment(Point(1, 0), Point(1, 1))) == \ + Segment3D(Point3D(Rational(5, 6), Rational(1, 3), Rational(-1, 6)), Point3D(Rational(7, 6), Rational(2, 3), Rational(1, 6))) + assert pl6.projection_line(Ray(Point(1, 0), Point(1, 1))) == \ + Ray3D(Point3D(Rational(14, 3), Rational(11, 3), Rational(11, 3)), Point3D(Rational(13, 3), Rational(13, 3), Rational(10, 3))) + assert pl3.perpendicular_line(r.args) == pl3.perpendicular_line(r) + + assert pl3.is_parallel(pl6) is False + assert pl4.is_parallel(pl6) + assert pl3.is_parallel(Line(p1, p2)) + assert pl6.is_parallel(l1) is False + + assert pl3.is_perpendicular(pl6) + assert pl4.is_perpendicular(pl7) + assert pl6.is_perpendicular(pl7) + assert pl6.is_perpendicular(pl4) is False + assert pl6.is_perpendicular(l1) is False + assert pl6.is_perpendicular(Line((0, 0, 0), (1, 1, 1))) + assert pl6.is_perpendicular((1, 1)) is False + + assert pl6.distance(pl6.arbitrary_point(u, v)) == 0 + assert pl7.distance(pl7.arbitrary_point(u, v)) == 0 + assert pl6.distance(pl6.arbitrary_point(t)) == 0 + assert pl7.distance(pl7.arbitrary_point(t)) == 0 + assert pl6.p1.distance(pl6.arbitrary_point(t)).simplify() == 1 + assert pl7.p1.distance(pl7.arbitrary_point(t)).simplify() == 1 + assert pl3.arbitrary_point(t) == Point3D(-sqrt(30)*sin(t)/30 + \ + 2*sqrt(5)*cos(t)/5, sqrt(30)*sin(t)/15 + sqrt(5)*cos(t)/5, sqrt(30)*sin(t)/6) + assert pl3.arbitrary_point(u, v) == Point3D(2*u - v, u + 2*v, 5*v) + + assert pl7.distance(Point3D(1, 3, 5)) == 5*sqrt(6)/6 + assert pl6.distance(Point3D(0, 0, 0)) == 4*sqrt(3) + assert pl6.distance(pl6.p1) == 0 + assert pl7.distance(pl6) == 0 + assert pl7.distance(l1) == 0 + assert pl6.distance(Segment3D(Point3D(2, 3, 1), Point3D(1, 3, 4))) == \ + pl6.distance(Point3D(1, 3, 4)) == 4*sqrt(3)/3 + assert pl6.distance(Segment3D(Point3D(1, 3, 4), Point3D(0, 3, 7))) == \ + pl6.distance(Point3D(0, 3, 7)) == 2*sqrt(3)/3 + assert pl6.distance(Segment3D(Point3D(0, 3, 7), Point3D(-1, 3, 10))) == 0 + assert pl6.distance(Segment3D(Point3D(-1, 3, 10), Point3D(-2, 3, 13))) == 0 + assert pl6.distance(Segment3D(Point3D(-2, 3, 13), Point3D(-3, 3, 16))) == \ + pl6.distance(Point3D(-2, 3, 13)) == 2*sqrt(3)/3 + assert pl6.distance(Plane(Point3D(5, 5, 5), normal_vector=(8, 8, 8))) == sqrt(3) + assert pl6.distance(Ray3D(Point3D(1, 3, 4), direction_ratio=[1, 0, -3])) == 4*sqrt(3)/3 + assert pl6.distance(Ray3D(Point3D(2, 3, 1), direction_ratio=[-1, 0, 3])) == 0 + + + assert pl6.angle_between(pl3) == pi/2 + assert pl6.angle_between(pl6) == 0 + assert pl6.angle_between(pl4) == 0 + assert pl7.angle_between(Line3D(Point3D(2, 3, 5), Point3D(2, 4, 6))) == \ + -asin(sqrt(3)/6) + assert pl6.angle_between(Ray3D(Point3D(2, 4, 1), Point3D(6, 5, 3))) == \ + asin(sqrt(7)/3) + assert pl7.angle_between(Segment3D(Point3D(5, 6, 1), Point3D(1, 2, 4))) == \ + asin(7*sqrt(246)/246) + + assert are_coplanar(l1, l2, l3) is False + assert are_coplanar(l1) is False + assert are_coplanar(Point3D(2, 7, 2), Point3D(0, 0, 2), + Point3D(1, 1, 2), Point3D(1, 2, 2)) + assert are_coplanar(Plane(p1, p2, p3), Plane(p1, p3, p2)) + assert Plane.are_concurrent(pl3, pl4, pl5) is False + assert Plane.are_concurrent(pl6) is False + raises(ValueError, lambda: Plane.are_concurrent(Point3D(0, 0, 0))) + raises(ValueError, lambda: Plane((1, 2, 3), normal_vector=(0, 0, 0))) + + assert pl3.parallel_plane(Point3D(1, 2, 5)) == Plane(Point3D(1, 2, 5), \ + normal_vector=(1, -2, 1)) + + # perpendicular_plane + p = Plane((0, 0, 0), (1, 0, 0)) + # default + assert p.perpendicular_plane() == Plane(Point3D(0, 0, 0), (0, 1, 0)) + # 1 pt + assert p.perpendicular_plane(Point3D(1, 0, 1)) == \ + Plane(Point3D(1, 0, 1), (0, 1, 0)) + # pts as tuples + assert p.perpendicular_plane((1, 0, 1), (1, 1, 1)) == \ + Plane(Point3D(1, 0, 1), (0, 0, -1)) + # more than two planes + raises(ValueError, lambda: p.perpendicular_plane((1, 0, 1), (1, 1, 1), (1, 1, 0))) + + a, b = Point3D(0, 0, 0), Point3D(0, 1, 0) + Z = (0, 0, 1) + p = Plane(a, normal_vector=Z) + # case 4 + assert p.perpendicular_plane(a, b) == Plane(a, (1, 0, 0)) + n = Point3D(*Z) + # case 1 + assert p.perpendicular_plane(a, n) == Plane(a, (-1, 0, 0)) + # case 2 + assert Plane(a, normal_vector=b.args).perpendicular_plane(a, a + b) == \ + Plane(Point3D(0, 0, 0), (1, 0, 0)) + # case 1&3 + assert Plane(b, normal_vector=Z).perpendicular_plane(b, b + n) == \ + Plane(Point3D(0, 1, 0), (-1, 0, 0)) + # case 2&3 + assert Plane(b, normal_vector=b.args).perpendicular_plane(n, n + b) == \ + Plane(Point3D(0, 0, 1), (1, 0, 0)) + + p = Plane(a, normal_vector=(0, 0, 1)) + assert p.perpendicular_plane() == Plane(a, normal_vector=(1, 0, 0)) + + assert pl6.intersection(pl6) == [pl6] + assert pl4.intersection(pl4.p1) == [pl4.p1] + assert pl3.intersection(pl6) == [ + Line3D(Point3D(8, 4, 0), Point3D(2, 4, 6))] + assert pl3.intersection(Line3D(Point3D(1,2,4), Point3D(4,4,2))) == [ + Point3D(2, Rational(8, 3), Rational(10, 3))] + assert pl3.intersection(Plane(Point3D(6, 0, 0), normal_vector=(2, -5, 3)) + ) == [Line3D(Point3D(-24, -12, 0), Point3D(-25, -13, -1))] + assert pl6.intersection(Ray3D(Point3D(2, 3, 1), Point3D(1, 3, 4))) == [ + Point3D(-1, 3, 10)] + assert pl6.intersection(Segment3D(Point3D(2, 3, 1), Point3D(1, 3, 4))) == [] + assert pl7.intersection(Line(Point(2, 3), Point(4, 2))) == [ + Point3D(Rational(13, 2), Rational(3, 4), 0)] + r = Ray(Point(2, 3), Point(4, 2)) + assert Plane((1,2,0), normal_vector=(0,0,1)).intersection(r) == [ + Ray3D(Point(2, 3), Point(4, 2))] + assert pl9.intersection(pl8) == [Line3D(Point3D(0, 0, 0), Point3D(12, 0, 0))] + assert pl10.intersection(pl11) == [Line3D(Point3D(0, 0, 1), Point3D(0, 2, 1))] + assert pl4.intersection(pl8) == [Line3D(Point3D(0, 0, 0), Point3D(1, -1, 0))] + assert pl11.intersection(pl8) == [] + assert pl9.intersection(pl11) == [Line3D(Point3D(0, 0, 1), Point3D(12, 0, 1))] + assert pl9.intersection(pl4) == [Line3D(Point3D(0, 0, 0), Point3D(12, 0, -12))] + assert pl3.random_point() in pl3 + assert pl3.random_point(seed=1) in pl3 + + # test geometrical entity using equals + assert pl4.intersection(pl4.p1)[0].equals(pl4.p1) + assert pl3.intersection(pl6)[0].equals(Line3D(Point3D(8, 4, 0), Point3D(2, 4, 6))) + pl8 = Plane((1, 2, 0), normal_vector=(0, 0, 1)) + assert pl8.intersection(Line3D(p1, (1, 12, 0)))[0].equals(Line((0, 0, 0), (0.1, 1.2, 0))) + assert pl8.intersection(Ray3D(p1, (1, 12, 0)))[0].equals(Ray((0, 0, 0), (1, 12, 0))) + assert pl8.intersection(Segment3D(p1, (21, 1, 0)))[0].equals(Segment3D(p1, (21, 1, 0))) + assert pl8.intersection(Plane(p1, normal_vector=(0, 0, 112)))[0].equals(pl8) + assert pl8.intersection(Plane(p1, normal_vector=(0, 12, 0)))[0].equals( + Line3D(p1, direction_ratio=(112 * pi, 0, 0))) + assert pl8.intersection(Plane(p1, normal_vector=(11, 0, 1)))[0].equals( + Line3D(p1, direction_ratio=(0, -11, 0))) + assert pl8.intersection(Plane(p1, normal_vector=(1, 0, 11)))[0].equals( + Line3D(p1, direction_ratio=(0, 11, 0))) + assert pl8.intersection(Plane(p1, normal_vector=(-1, -1, -11)))[0].equals( + Line3D(p1, direction_ratio=(1, -1, 0))) + assert pl3.random_point() in pl3 + assert len(pl8.intersection(Ray3D(Point3D(0, 2, 3), Point3D(1, 0, 3)))) == 0 + # check if two plane are equals + assert pl6.intersection(pl6)[0].equals(pl6) + assert pl8.equals(Plane(p1, normal_vector=(0, 12, 0))) is False + assert pl8.equals(pl8) + assert pl8.equals(Plane(p1, normal_vector=(0, 0, -12))) + assert pl8.equals(Plane(p1, normal_vector=(0, 0, -12*sqrt(3)))) + assert pl8.equals(p1) is False + + # issue 8570 + l2 = Line3D(Point3D(Rational(50000004459633, 5000000000000), + Rational(-891926590718643, 1000000000000000), + Rational(231800966893633, 100000000000000)), + Point3D(Rational(50000004459633, 50000000000000), + Rational(-222981647679771, 250000000000000), + Rational(231800966893633, 100000000000000))) + + p2 = Plane(Point3D(Rational(402775636372767, 100000000000000), + Rational(-97224357654973, 100000000000000), + Rational(216793600814789, 100000000000000)), + (-S('9.00000087501922'), -S('4.81170658872543e-13'), + S('0.0'))) + + assert str([i.n(2) for i in p2.intersection(l2)]) == \ + '[Point3D(4.0, -0.89, 2.3)]' + + +def test_dimension_normalization(): + A = Plane(Point3D(1, 1, 2), normal_vector=(1, 1, 1)) + b = Point(1, 1) + assert A.projection(b) == Point(Rational(5, 3), Rational(5, 3), Rational(2, 3)) + + a, b = Point(0, 0), Point3D(0, 1) + Z = (0, 0, 1) + p = Plane(a, normal_vector=Z) + assert p.perpendicular_plane(a, b) == Plane(Point3D(0, 0, 0), (1, 0, 0)) + assert Plane((1, 2, 1), (2, 1, 0), (3, 1, 2) + ).intersection((2, 1)) == [Point(2, 1, 0)] + + +def test_parameter_value(): + t, u, v = symbols("t, u v") + p1, p2, p3 = Point(0, 0, 0), Point(0, 0, 1), Point(0, 1, 0) + p = Plane(p1, p2, p3) + assert p.parameter_value((0, -3, 2), t) == {t: asin(2*sqrt(13)/13)} + assert p.parameter_value((0, -3, 2), u, v) == {u: 3, v: 2} + assert p.parameter_value(p1, t) == p1 + raises(ValueError, lambda: p.parameter_value((1, 0, 0), t)) + raises(ValueError, lambda: p.parameter_value(Line(Point(0, 0), Point(1, 1)), t)) + raises(ValueError, lambda: p.parameter_value((0, -3, 2), t, 1)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_point.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_point.py new file mode 100644 index 0000000000000000000000000000000000000000..1f2b2768eb3fba2009f702351de1aac3ed6e71d4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_point.py @@ -0,0 +1,481 @@ +from sympy.core.basic import Basic +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.parameters import evaluate +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import sympify +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.geometry import Line, Point, Point2D, Point3D, Line3D, Plane +from sympy.geometry.entity import rotate, scale, translate, GeometryEntity +from sympy.matrices import Matrix +from sympy.utilities.iterables import subsets, permutations, cartes +from sympy.utilities.misc import Undecidable +from sympy.testing.pytest import raises, warns + + +def test_point(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + x1 = Symbol('x1', real=True) + x2 = Symbol('x2', real=True) + y1 = Symbol('y1', real=True) + y2 = Symbol('y2', real=True) + half = S.Half + p1 = Point(x1, x2) + p2 = Point(y1, y2) + p3 = Point(0, 0) + p4 = Point(1, 1) + p5 = Point(0, 1) + line = Line(Point(1, 0), slope=1) + + assert p1 in p1 + assert p1 not in p2 + assert p2.y == y2 + assert (p3 + p4) == p4 + assert (p2 - p1) == Point(y1 - x1, y2 - x2) + assert -p2 == Point(-y1, -y2) + raises(TypeError, lambda: Point(1)) + raises(ValueError, lambda: Point([1])) + raises(ValueError, lambda: Point(3, I)) + raises(ValueError, lambda: Point(2*I, I)) + raises(ValueError, lambda: Point(3 + I, I)) + + assert Point(34.05, sqrt(3)) == Point(Rational(681, 20), sqrt(3)) + assert Point.midpoint(p3, p4) == Point(half, half) + assert Point.midpoint(p1, p4) == Point(half + half*x1, half + half*x2) + assert Point.midpoint(p2, p2) == p2 + assert p2.midpoint(p2) == p2 + assert p1.origin == Point(0, 0) + + assert Point.distance(p3, p4) == sqrt(2) + assert Point.distance(p1, p1) == 0 + assert Point.distance(p3, p2) == sqrt(p2.x**2 + p2.y**2) + raises(TypeError, lambda: Point.distance(p1, 0)) + raises(TypeError, lambda: Point.distance(p1, GeometryEntity())) + + # distance should be symmetric + assert p1.distance(line) == line.distance(p1) + assert p4.distance(line) == line.distance(p4) + + assert Point.taxicab_distance(p4, p3) == 2 + + assert Point.canberra_distance(p4, p5) == 1 + raises(ValueError, lambda: Point.canberra_distance(p3, p3)) + + p1_1 = Point(x1, x1) + p1_2 = Point(y2, y2) + p1_3 = Point(x1 + 1, x1) + assert Point.is_collinear(p3) + + with warns(UserWarning, test_stacklevel=False): + assert Point.is_collinear(p3, Point(p3, dim=4)) + assert p3.is_collinear() + assert Point.is_collinear(p3, p4) + assert Point.is_collinear(p3, p4, p1_1, p1_2) + assert Point.is_collinear(p3, p4, p1_1, p1_3) is False + assert Point.is_collinear(p3, p3, p4, p5) is False + + raises(TypeError, lambda: Point.is_collinear(line)) + raises(TypeError, lambda: p1_1.is_collinear(line)) + + assert p3.intersection(Point(0, 0)) == [p3] + assert p3.intersection(p4) == [] + assert p3.intersection(line) == [] + with warns(UserWarning, test_stacklevel=False): + assert Point.intersection(Point(0, 0, 0), Point(0, 0)) == [Point(0, 0, 0)] + + x_pos = Symbol('x', positive=True) + p2_1 = Point(x_pos, 0) + p2_2 = Point(0, x_pos) + p2_3 = Point(-x_pos, 0) + p2_4 = Point(0, -x_pos) + p2_5 = Point(x_pos, 5) + assert Point.is_concyclic(p2_1) + assert Point.is_concyclic(p2_1, p2_2) + assert Point.is_concyclic(p2_1, p2_2, p2_3, p2_4) + for pts in permutations((p2_1, p2_2, p2_3, p2_5)): + assert Point.is_concyclic(*pts) is False + assert Point.is_concyclic(p4, p4 * 2, p4 * 3) is False + assert Point(0, 0).is_concyclic((1, 1), (2, 2), (2, 1)) is False + assert Point.is_concyclic(Point(0, 0, 0, 0), Point(1, 0, 0, 0), Point(1, 1, 0, 0), Point(1, 1, 1, 0)) is False + + assert p1.is_scalar_multiple(p1) + assert p1.is_scalar_multiple(2*p1) + assert not p1.is_scalar_multiple(p2) + assert Point.is_scalar_multiple(Point(1, 1), (-1, -1)) + assert Point.is_scalar_multiple(Point(0, 0), (0, -1)) + # test when is_scalar_multiple can't be determined + raises(Undecidable, lambda: Point.is_scalar_multiple(Point(sympify("x1%y1"), sympify("x2%y2")), Point(0, 1))) + + assert Point(0, 1).orthogonal_direction == Point(1, 0) + assert Point(1, 0).orthogonal_direction == Point(0, 1) + + assert p1.is_zero is None + assert p3.is_zero + assert p4.is_zero is False + assert p1.is_nonzero is None + assert p3.is_nonzero is False + assert p4.is_nonzero + + assert p4.scale(2, 3) == Point(2, 3) + assert p3.scale(2, 3) == p3 + + assert p4.rotate(pi, Point(0.5, 0.5)) == p3 + assert p1.__radd__(p2) == p1.midpoint(p2).scale(2, 2) + assert (-p3).__rsub__(p4) == p3.midpoint(p4).scale(2, 2) + + assert p4 * 5 == Point(5, 5) + assert p4 / 5 == Point(0.2, 0.2) + assert 5 * p4 == Point(5, 5) + + raises(ValueError, lambda: Point(0, 0) + 10) + + # Point differences should be simplified + assert Point(x*(x - 1), y) - Point(x**2 - x, y + 1) == Point(0, -1) + + a, b = S.Half, Rational(1, 3) + assert Point(a, b).evalf(2) == \ + Point(a.n(2), b.n(2), evaluate=False) + raises(ValueError, lambda: Point(1, 2) + 1) + + # test project + assert Point.project((0, 1), (1, 0)) == Point(0, 0) + assert Point.project((1, 1), (1, 0)) == Point(1, 0) + raises(ValueError, lambda: Point.project(p1, Point(0, 0))) + + # test transformations + p = Point(1, 0) + assert p.rotate(pi/2) == Point(0, 1) + assert p.rotate(pi/2, p) == p + p = Point(1, 1) + assert p.scale(2, 3) == Point(2, 3) + assert p.translate(1, 2) == Point(2, 3) + assert p.translate(1) == Point(2, 1) + assert p.translate(y=1) == Point(1, 2) + assert p.translate(*p.args) == Point(2, 2) + + # Check invalid input for transform + raises(ValueError, lambda: p3.transform(p3)) + raises(ValueError, lambda: p.transform(Matrix([[1, 0], [0, 1]]))) + + # test __contains__ + assert 0 in Point(0, 0, 0, 0) + assert 1 not in Point(0, 0, 0, 0) + + # test affine_rank + assert Point.affine_rank() == -1 + + +def test_point3D(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + x1 = Symbol('x1', real=True) + x2 = Symbol('x2', real=True) + x3 = Symbol('x3', real=True) + y1 = Symbol('y1', real=True) + y2 = Symbol('y2', real=True) + y3 = Symbol('y3', real=True) + half = S.Half + p1 = Point3D(x1, x2, x3) + p2 = Point3D(y1, y2, y3) + p3 = Point3D(0, 0, 0) + p4 = Point3D(1, 1, 1) + p5 = Point3D(0, 1, 2) + + assert p1 in p1 + assert p1 not in p2 + assert p2.y == y2 + assert (p3 + p4) == p4 + assert (p2 - p1) == Point3D(y1 - x1, y2 - x2, y3 - x3) + assert -p2 == Point3D(-y1, -y2, -y3) + + assert Point(34.05, sqrt(3)) == Point(Rational(681, 20), sqrt(3)) + assert Point3D.midpoint(p3, p4) == Point3D(half, half, half) + assert Point3D.midpoint(p1, p4) == Point3D(half + half*x1, half + half*x2, + half + half*x3) + assert Point3D.midpoint(p2, p2) == p2 + assert p2.midpoint(p2) == p2 + + assert Point3D.distance(p3, p4) == sqrt(3) + assert Point3D.distance(p1, p1) == 0 + assert Point3D.distance(p3, p2) == sqrt(p2.x**2 + p2.y**2 + p2.z**2) + + p1_1 = Point3D(x1, x1, x1) + p1_2 = Point3D(y2, y2, y2) + p1_3 = Point3D(x1 + 1, x1, x1) + Point3D.are_collinear(p3) + assert Point3D.are_collinear(p3, p4) + assert Point3D.are_collinear(p3, p4, p1_1, p1_2) + assert Point3D.are_collinear(p3, p4, p1_1, p1_3) is False + assert Point3D.are_collinear(p3, p3, p4, p5) is False + + assert p3.intersection(Point3D(0, 0, 0)) == [p3] + assert p3.intersection(p4) == [] + + + assert p4 * 5 == Point3D(5, 5, 5) + assert p4 / 5 == Point3D(0.2, 0.2, 0.2) + assert 5 * p4 == Point3D(5, 5, 5) + + raises(ValueError, lambda: Point3D(0, 0, 0) + 10) + + # Test coordinate properties + assert p1.coordinates == (x1, x2, x3) + assert p2.coordinates == (y1, y2, y3) + assert p3.coordinates == (0, 0, 0) + assert p4.coordinates == (1, 1, 1) + assert p5.coordinates == (0, 1, 2) + assert p5.x == 0 + assert p5.y == 1 + assert p5.z == 2 + + # Point differences should be simplified + assert Point3D(x*(x - 1), y, 2) - Point3D(x**2 - x, y + 1, 1) == \ + Point3D(0, -1, 1) + + a, b, c = S.Half, Rational(1, 3), Rational(1, 4) + assert Point3D(a, b, c).evalf(2) == \ + Point(a.n(2), b.n(2), c.n(2), evaluate=False) + raises(ValueError, lambda: Point3D(1, 2, 3) + 1) + + # test transformations + p = Point3D(1, 1, 1) + assert p.scale(2, 3) == Point3D(2, 3, 1) + assert p.translate(1, 2) == Point3D(2, 3, 1) + assert p.translate(1) == Point3D(2, 1, 1) + assert p.translate(z=1) == Point3D(1, 1, 2) + assert p.translate(*p.args) == Point3D(2, 2, 2) + + # Test __new__ + assert Point3D(0.1, 0.2, evaluate=False, on_morph='ignore').args[0].is_Float + + # Test length property returns correctly + assert p.length == 0 + assert p1_1.length == 0 + assert p1_2.length == 0 + + # Test are_colinear type error + raises(TypeError, lambda: Point3D.are_collinear(p, x)) + + # Test are_coplanar + assert Point.are_coplanar() + assert Point.are_coplanar((1, 2, 0), (1, 2, 0), (1, 3, 0)) + assert Point.are_coplanar((1, 2, 0), (1, 2, 3)) + with warns(UserWarning, test_stacklevel=False): + raises(ValueError, lambda: Point2D.are_coplanar((1, 2), (1, 2, 3))) + assert Point3D.are_coplanar((1, 2, 0), (1, 2, 3)) + assert Point.are_coplanar((0, 0, 0), (1, 1, 0), (1, 1, 1), (1, 2, 1)) is False + planar2 = Point3D(1, -1, 1) + planar3 = Point3D(-1, 1, 1) + assert Point3D.are_coplanar(p, planar2, planar3) == True + assert Point3D.are_coplanar(p, planar2, planar3, p3) == False + assert Point.are_coplanar(p, planar2) + planar2 = Point3D(1, 1, 2) + planar3 = Point3D(1, 1, 3) + assert Point3D.are_coplanar(p, planar2, planar3) # line, not plane + plane = Plane((1, 2, 1), (2, 1, 0), (3, 1, 2)) + assert Point.are_coplanar(*[plane.projection(((-1)**i, i)) for i in range(4)]) + + # all 2D points are coplanar + assert Point.are_coplanar(Point(x, y), Point(x, x + y), Point(y, x + 2)) is True + + # Test Intersection + assert planar2.intersection(Line3D(p, planar3)) == [Point3D(1, 1, 2)] + + # Test Scale + assert planar2.scale(1, 1, 1) == planar2 + assert planar2.scale(2, 2, 2, planar3) == Point3D(1, 1, 1) + assert planar2.scale(1, 1, 1, p3) == planar2 + + # Test Transform + identity = Matrix([[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 0, 1]]) + assert p.transform(identity) == p + trans = Matrix([[1, 0, 0, 1], [0, 1, 0, 1], [0, 0, 1, 1], [0, 0, 0, 1]]) + assert p.transform(trans) == Point3D(2, 2, 2) + raises(ValueError, lambda: p.transform(p)) + raises(ValueError, lambda: p.transform(Matrix([[1, 0], [0, 1]]))) + + # Test Equals + assert p.equals(x1) == False + + # Test __sub__ + p_4d = Point(0, 0, 0, 1) + with warns(UserWarning, test_stacklevel=False): + assert p - p_4d == Point(1, 1, 1, -1) + p_4d3d = Point(0, 0, 1, 0) + with warns(UserWarning, test_stacklevel=False): + assert p - p_4d3d == Point(1, 1, 0, 0) + + +def test_Point2D(): + + # Test Distance + p1 = Point2D(1, 5) + p2 = Point2D(4, 2.5) + p3 = (6, 3) + assert p1.distance(p2) == sqrt(61)/2 + assert p2.distance(p3) == sqrt(17)/2 + + # Test coordinates + assert p1.x == 1 + assert p1.y == 5 + assert p2.x == 4 + assert p2.y == S(5)/2 + assert p1.coordinates == (1, 5) + assert p2.coordinates == (4, S(5)/2) + + # test bounds + assert p1.bounds == (1, 5, 1, 5) + +def test_issue_9214(): + p1 = Point3D(4, -2, 6) + p2 = Point3D(1, 2, 3) + p3 = Point3D(7, 2, 3) + + assert Point3D.are_collinear(p1, p2, p3) is False + + +def test_issue_11617(): + p1 = Point3D(1,0,2) + p2 = Point2D(2,0) + + with warns(UserWarning, test_stacklevel=False): + assert p1.distance(p2) == sqrt(5) + + +def test_transform(): + p = Point(1, 1) + assert p.transform(rotate(pi/2)) == Point(-1, 1) + assert p.transform(scale(3, 2)) == Point(3, 2) + assert p.transform(translate(1, 2)) == Point(2, 3) + assert Point(1, 1).scale(2, 3, (4, 5)) == \ + Point(-2, -7) + assert Point(1, 1).translate(4, 5) == \ + Point(5, 6) + + +def test_concyclic_doctest_bug(): + p1, p2 = Point(-1, 0), Point(1, 0) + p3, p4 = Point(0, 1), Point(-1, 2) + assert Point.is_concyclic(p1, p2, p3) + assert not Point.is_concyclic(p1, p2, p3, p4) + + +def test_arguments(): + """Functions accepting `Point` objects in `geometry` + should also accept tuples and lists and + automatically convert them to points.""" + + singles2d = ((1,2), [1,2], Point(1,2)) + singles2d2 = ((1,3), [1,3], Point(1,3)) + doubles2d = cartes(singles2d, singles2d2) + p2d = Point2D(1,2) + singles3d = ((1,2,3), [1,2,3], Point(1,2,3)) + doubles3d = subsets(singles3d, 2) + p3d = Point3D(1,2,3) + singles4d = ((1,2,3,4), [1,2,3,4], Point(1,2,3,4)) + doubles4d = subsets(singles4d, 2) + p4d = Point(1,2,3,4) + + # test 2D + test_single = ['distance', 'is_scalar_multiple', 'taxicab_distance', 'midpoint', 'intersection', 'dot', 'equals', '__add__', '__sub__'] + test_double = ['is_concyclic', 'is_collinear'] + for p in singles2d: + Point2D(p) + for func in test_single: + for p in singles2d: + getattr(p2d, func)(p) + for func in test_double: + for p in doubles2d: + getattr(p2d, func)(*p) + + # test 3D + test_double = ['is_collinear'] + for p in singles3d: + Point3D(p) + for func in test_single: + for p in singles3d: + getattr(p3d, func)(p) + for func in test_double: + for p in doubles3d: + getattr(p3d, func)(*p) + + # test 4D + test_double = ['is_collinear'] + for p in singles4d: + Point(p) + for func in test_single: + for p in singles4d: + getattr(p4d, func)(p) + for func in test_double: + for p in doubles4d: + getattr(p4d, func)(*p) + + # test evaluate=False for ops + x = Symbol('x') + a = Point(0, 1) + assert a + (0.1, x) == Point(0.1, 1 + x, evaluate=False) + a = Point(0, 1) + assert a/10.0 == Point(0, 0.1, evaluate=False) + a = Point(0, 1) + assert a*10.0 == Point(0, 10.0, evaluate=False) + + # test evaluate=False when changing dimensions + u = Point(.1, .2, evaluate=False) + u4 = Point(u, dim=4, on_morph='ignore') + assert u4.args == (.1, .2, 0, 0) + assert all(i.is_Float for i in u4.args[:2]) + # and even when *not* changing dimensions + assert all(i.is_Float for i in Point(u).args) + + # never raise error if creating an origin + assert Point(dim=3, on_morph='error') + + # raise error with unmatched dimension + raises(ValueError, lambda: Point(1, 1, dim=3, on_morph='error')) + # test unknown on_morph + raises(ValueError, lambda: Point(1, 1, dim=3, on_morph='unknown')) + # test invalid expressions + raises(TypeError, lambda: Point(Basic(), Basic())) + +def test_unit(): + assert Point(1, 1).unit == Point(sqrt(2)/2, sqrt(2)/2) + + +def test_dot(): + raises(TypeError, lambda: Point(1, 2).dot(Line((0, 0), (1, 1)))) + + +def test__normalize_dimension(): + assert Point._normalize_dimension(Point(1, 2), Point(3, 4)) == [ + Point(1, 2), Point(3, 4)] + assert Point._normalize_dimension( + Point(1, 2), Point(3, 4, 0), on_morph='ignore') == [ + Point(1, 2, 0), Point(3, 4, 0)] + + +def test_issue_22684(): + # Used to give an error + with evaluate(False): + Point(1, 2) + + +def test_direction_cosine(): + p1 = Point3D(0, 0, 0) + p2 = Point3D(1, 1, 1) + + assert p1.direction_cosine(Point3D(1, 0, 0)) == [1, 0, 0] + assert p1.direction_cosine(Point3D(0, 1, 0)) == [0, 1, 0] + assert p1.direction_cosine(Point3D(0, 0, pi)) == [0, 0, 1] + + assert p1.direction_cosine(Point3D(5, 0, 0)) == [1, 0, 0] + assert p1.direction_cosine(Point3D(0, sqrt(3), 0)) == [0, 1, 0] + assert p1.direction_cosine(Point3D(0, 0, 5)) == [0, 0, 1] + + assert p1.direction_cosine(Point3D(2.4, 2.4, 0)) == [sqrt(2)/2, sqrt(2)/2, 0] + assert p1.direction_cosine(Point3D(1, 1, 1)) == [sqrt(3) / 3, sqrt(3) / 3, sqrt(3) / 3] + assert p1.direction_cosine(Point3D(-12, 0 -15)) == [-4*sqrt(41)/41, -5*sqrt(41)/41, 0] + + assert p2.direction_cosine(Point3D(0, 0, 0)) == [-sqrt(3) / 3, -sqrt(3) / 3, -sqrt(3) / 3] + assert p2.direction_cosine(Point3D(1, 1, 12)) == [0, 0, 1] + assert p2.direction_cosine(Point3D(12, 1, 12)) == [sqrt(2) / 2, 0, sqrt(2) / 2] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_polygon.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_polygon.py new file mode 100644 index 0000000000000000000000000000000000000000..520023349f363bdb12146465305c2a5650c80934 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_polygon.py @@ -0,0 +1,676 @@ +from sympy.core.numbers import (Float, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, cos, sin) +from sympy.functions.elementary.trigonometric import tan +from sympy.geometry import (Circle, Ellipse, GeometryError, Point, Point2D, + Polygon, Ray, RegularPolygon, Segment, Triangle, + are_similar, convex_hull, intersection, Line, Ray2D) +from sympy.testing.pytest import raises, slow, warns +from sympy.core.random import verify_numerically +from sympy.geometry.polygon import rad, deg +from sympy.integrals.integrals import integrate +from sympy.utilities.iterables import rotate_left + + +def feq(a, b): + """Test if two floating point values are 'equal'.""" + t_float = Float("1.0E-10") + return -t_float < a - b < t_float + +@slow +def test_polygon(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + q = Symbol('q', real=True) + u = Symbol('u', real=True) + v = Symbol('v', real=True) + w = Symbol('w', real=True) + x1 = Symbol('x1', real=True) + half = S.Half + a, b, c = Point(0, 0), Point(2, 0), Point(3, 3) + t = Triangle(a, b, c) + assert Polygon(Point(0, 0)) == Point(0, 0) + assert Polygon(a, Point(1, 0), b, c) == t + assert Polygon(Point(1, 0), b, c, a) == t + assert Polygon(b, c, a, Point(1, 0)) == t + # 2 "remove folded" tests + assert Polygon(a, Point(3, 0), b, c) == t + assert Polygon(a, b, Point(3, -1), b, c) == t + # remove multiple collinear points + assert Polygon(Point(-4, 15), Point(-11, 15), Point(-15, 15), + Point(-15, 33/5), Point(-15, -87/10), Point(-15, -15), + Point(-42/5, -15), Point(-2, -15), Point(7, -15), Point(15, -15), + Point(15, -3), Point(15, 10), Point(15, 15)) == \ + Polygon(Point(-15, -15), Point(15, -15), Point(15, 15), Point(-15, 15)) + + p1 = Polygon( + Point(0, 0), Point(3, -1), + Point(6, 0), Point(4, 5), + Point(2, 3), Point(0, 3)) + p2 = Polygon( + Point(6, 0), Point(3, -1), + Point(0, 0), Point(0, 3), + Point(2, 3), Point(4, 5)) + p3 = Polygon( + Point(0, 0), Point(3, 0), + Point(5, 2), Point(4, 4)) + p4 = Polygon( + Point(0, 0), Point(4, 4), + Point(5, 2), Point(3, 0)) + p5 = Polygon( + Point(0, 0), Point(4, 4), + Point(0, 4)) + p6 = Polygon( + Point(-11, 1), Point(-9, 6.6), + Point(-4, -3), Point(-8.4, -8.7)) + p7 = Polygon( + Point(x, y), Point(q, u), + Point(v, w)) + p8 = Polygon( + Point(x, y), Point(v, w), + Point(q, u)) + p9 = Polygon( + Point(0, 0), Point(4, 4), + Point(3, 0), Point(5, 2)) + p10 = Polygon( + Point(0, 2), Point(2, 2), + Point(0, 0), Point(2, 0)) + p11 = Polygon(Point(0, 0), 1, n=3) + p12 = Polygon(Point(0, 0), 1, 0, n=3) + p13 = Polygon( + Point(0, 0),Point(8, 8), + Point(23, 20),Point(0, 20)) + p14 = Polygon(*rotate_left(p13.args, 1)) + + + r = Ray(Point(-9, 6.6), Point(-9, 5.5)) + # + # General polygon + # + assert p1 == p2 + assert len(p1.args) == 6 + assert len(p1.sides) == 6 + assert p1.perimeter == 5 + 2*sqrt(10) + sqrt(29) + sqrt(8) + assert p1.area == 22 + assert not p1.is_convex() + assert Polygon((-1, 1), (2, -1), (2, 1), (-1, -1), (3, 0) + ).is_convex() is False + # ensure convex for both CW and CCW point specification + assert p3.is_convex() + assert p4.is_convex() + dict5 = p5.angles + assert dict5[Point(0, 0)] == pi / 4 + assert dict5[Point(0, 4)] == pi / 2 + assert p5.encloses_point(Point(x, y)) is None + assert p5.encloses_point(Point(1, 3)) + assert p5.encloses_point(Point(0, 0)) is False + assert p5.encloses_point(Point(4, 0)) is False + assert p1.encloses(Circle(Point(2.5, 2.5), 5)) is False + assert p1.encloses(Ellipse(Point(2.5, 2), 5, 6)) is False + assert p5.plot_interval('x') == [x, 0, 1] + assert p5.distance( + Polygon(Point(10, 10), Point(14, 14), Point(10, 14))) == 6 * sqrt(2) + assert p5.distance( + Polygon(Point(1, 8), Point(5, 8), Point(8, 12), Point(1, 12))) == 4 + with warns(UserWarning, \ + match="Polygons may intersect producing erroneous output"): + Polygon(Point(0, 0), Point(1, 0), Point(1, 1)).distance( + Polygon(Point(0, 0), Point(0, 1), Point(1, 1))) + assert hash(p5) == hash(Polygon(Point(0, 0), Point(4, 4), Point(0, 4))) + assert hash(p1) == hash(p2) + assert hash(p7) == hash(p8) + assert hash(p3) != hash(p9) + assert p5 == Polygon(Point(4, 4), Point(0, 4), Point(0, 0)) + assert Polygon(Point(4, 4), Point(0, 4), Point(0, 0)) in p5 + assert p5 != Point(0, 4) + assert Point(0, 1) in p5 + assert p5.arbitrary_point('t').subs(Symbol('t', real=True), 0) == \ + Point(0, 0) + raises(ValueError, lambda: Polygon( + Point(x, 0), Point(0, y), Point(x, y)).arbitrary_point('x')) + assert p6.intersection(r) == [Point(-9, Rational(-84, 13)), Point(-9, Rational(33, 5))] + assert p10.area == 0 + assert p11 == RegularPolygon(Point(0, 0), 1, 3, 0) + assert p11 == p12 + assert p11.vertices[0] == Point(1, 0) + assert p11.args[0] == Point(0, 0) + p11.spin(pi/2) + assert p11.vertices[0] == Point(0, 1) + # + # Regular polygon + # + p1 = RegularPolygon(Point(0, 0), 10, 5) + p2 = RegularPolygon(Point(0, 0), 5, 5) + raises(GeometryError, lambda: RegularPolygon(Point(0, 0), Point(0, + 1), Point(1, 1))) + raises(GeometryError, lambda: RegularPolygon(Point(0, 0), 1, 2)) + raises(ValueError, lambda: RegularPolygon(Point(0, 0), 1, 2.5)) + + assert p1 != p2 + assert p1.interior_angle == pi*Rational(3, 5) + assert p1.exterior_angle == pi*Rational(2, 5) + assert p2.apothem == 5*cos(pi/5) + assert p2.circumcenter == p1.circumcenter == Point(0, 0) + assert p1.circumradius == p1.radius == 10 + assert p2.circumcircle == Circle(Point(0, 0), 5) + assert p2.incircle == Circle(Point(0, 0), p2.apothem) + assert p2.inradius == p2.apothem == (5 * (1 + sqrt(5)) / 4) + p2.spin(pi / 10) + dict1 = p2.angles + assert dict1[Point(0, 5)] == 3 * pi / 5 + assert p1.is_convex() + assert p1.rotation == 0 + assert p1.encloses_point(Point(0, 0)) + assert p1.encloses_point(Point(11, 0)) is False + assert p2.encloses_point(Point(0, 4.9)) + p1.spin(pi/3) + assert p1.rotation == pi/3 + assert p1.vertices[0] == Point(5, 5*sqrt(3)) + for var in p1.args: + if isinstance(var, Point): + assert var == Point(0, 0) + else: + assert var in (5, 10, pi / 3) + assert p1 != Point(0, 0) + assert p1 != p5 + + # while spin works in place (notice that rotation is 2pi/3 below) + # rotate returns a new object + p1_old = p1 + assert p1.rotate(pi/3) == RegularPolygon(Point(0, 0), 10, 5, pi*Rational(2, 3)) + assert p1 == p1_old + + assert p1.area == (-250*sqrt(5) + 1250)/(4*tan(pi/5)) + assert p1.length == 20*sqrt(-sqrt(5)/8 + Rational(5, 8)) + assert p1.scale(2, 2) == \ + RegularPolygon(p1.center, p1.radius*2, p1._n, p1.rotation) + assert RegularPolygon((0, 0), 1, 4).scale(2, 3) == \ + Polygon(Point(2, 0), Point(0, 3), Point(-2, 0), Point(0, -3)) + + assert repr(p1) == str(p1) + + # + # Angles + # + angles = p4.angles + assert feq(angles[Point(0, 0)].evalf(), Float("0.7853981633974483")) + assert feq(angles[Point(4, 4)].evalf(), Float("1.2490457723982544")) + assert feq(angles[Point(5, 2)].evalf(), Float("1.8925468811915388")) + assert feq(angles[Point(3, 0)].evalf(), Float("2.3561944901923449")) + + angles = p3.angles + assert feq(angles[Point(0, 0)].evalf(), Float("0.7853981633974483")) + assert feq(angles[Point(4, 4)].evalf(), Float("1.2490457723982544")) + assert feq(angles[Point(5, 2)].evalf(), Float("1.8925468811915388")) + assert feq(angles[Point(3, 0)].evalf(), Float("2.3561944901923449")) + + # https://github.com/sympy/sympy/issues/24885 + interior_angles_sum = sum(p13.angles.values()) + assert feq(interior_angles_sum, (len(p13.angles) - 2)*pi ) + interior_angles_sum = sum(p14.angles.values()) + assert feq(interior_angles_sum, (len(p14.angles) - 2)*pi ) + + # + # Triangle + # + p1 = Point(0, 0) + p2 = Point(5, 0) + p3 = Point(0, 5) + t1 = Triangle(p1, p2, p3) + t2 = Triangle(p1, p2, Point(Rational(5, 2), sqrt(Rational(75, 4)))) + t3 = Triangle(p1, Point(x1, 0), Point(0, x1)) + s1 = t1.sides + assert Triangle(p1, p2, p1) == Polygon(p1, p2, p1) == Segment(p1, p2) + raises(GeometryError, lambda: Triangle(Point(0, 0))) + + # Basic stuff + assert Triangle(p1, p1, p1) == p1 + assert Triangle(p2, p2*2, p2*3) == Segment(p2, p2*3) + assert t1.area == Rational(25, 2) + assert t1.is_right() + assert t2.is_right() is False + assert t3.is_right() + assert p1 in t1 + assert t1.sides[0] in t1 + assert Segment((0, 0), (1, 0)) in t1 + assert Point(5, 5) not in t2 + assert t1.is_convex() + assert feq(t1.angles[p1].evalf(), pi.evalf()/2) + + assert t1.is_equilateral() is False + assert t2.is_equilateral() + assert t3.is_equilateral() is False + assert are_similar(t1, t2) is False + assert are_similar(t1, t3) + assert are_similar(t2, t3) is False + assert t1.is_similar(Point(0, 0)) is False + assert t1.is_similar(t2) is False + + # Bisectors + bisectors = t1.bisectors() + assert bisectors[p1] == Segment( + p1, Point(Rational(5, 2), Rational(5, 2))) + assert t2.bisectors()[p2] == Segment( + Point(5, 0), Point(Rational(5, 4), 5*sqrt(3)/4)) + p4 = Point(0, x1) + assert t3.bisectors()[p4] == Segment(p4, Point(x1*(sqrt(2) - 1), 0)) + ic = (250 - 125*sqrt(2))/50 + assert t1.incenter == Point(ic, ic) + + # Inradius + assert t1.inradius == t1.incircle.radius == 5 - 5*sqrt(2)/2 + assert t2.inradius == t2.incircle.radius == 5*sqrt(3)/6 + assert t3.inradius == t3.incircle.radius == x1**2/((2 + sqrt(2))*Abs(x1)) + + # Exradius + assert t1.exradii[t1.sides[2]] == 5*sqrt(2)/2 + + # Excenters + assert t1.excenters[t1.sides[2]] == Point2D(25*sqrt(2), -5*sqrt(2)/2) + + # Circumcircle + assert t1.circumcircle.center == Point(2.5, 2.5) + + # Medians + Centroid + m = t1.medians + assert t1.centroid == Point(Rational(5, 3), Rational(5, 3)) + assert m[p1] == Segment(p1, Point(Rational(5, 2), Rational(5, 2))) + assert t3.medians[p1] == Segment(p1, Point(x1/2, x1/2)) + assert intersection(m[p1], m[p2], m[p3]) == [t1.centroid] + assert t1.medial == Triangle(Point(2.5, 0), Point(0, 2.5), Point(2.5, 2.5)) + + # Nine-point circle + assert t1.nine_point_circle == Circle(Point(2.5, 0), + Point(0, 2.5), Point(2.5, 2.5)) + assert t1.nine_point_circle == Circle(Point(0, 0), + Point(0, 2.5), Point(2.5, 2.5)) + + # Perpendicular + altitudes = t1.altitudes + assert altitudes[p1] == Segment(p1, Point(Rational(5, 2), Rational(5, 2))) + assert altitudes[p2].equals(s1[0]) + assert altitudes[p3] == s1[2] + assert t1.orthocenter == p1 + t = S('''Triangle( + Point(100080156402737/5000000000000, 79782624633431/500000000000), + Point(39223884078253/2000000000000, 156345163124289/1000000000000), + Point(31241359188437/1250000000000, 338338270939941/1000000000000000))''') + assert t.orthocenter == S('''Point(-780660869050599840216997''' + '''79471538701955848721853/80368430960602242240789074233100000000000000,''' + '''20151573611150265741278060334545897615974257/16073686192120448448157''' + '''8148466200000000000)''') + + # Ensure + assert len(intersection(*bisectors.values())) == 1 + assert len(intersection(*altitudes.values())) == 1 + assert len(intersection(*m.values())) == 1 + + # Distance + p1 = Polygon( + Point(0, 0), Point(1, 0), + Point(1, 1), Point(0, 1)) + p2 = Polygon( + Point(0, Rational(5)/4), Point(1, Rational(5)/4), + Point(1, Rational(9)/4), Point(0, Rational(9)/4)) + p3 = Polygon( + Point(1, 2), Point(2, 2), + Point(2, 1)) + p4 = Polygon( + Point(1, 1), Point(Rational(6)/5, 1), + Point(1, Rational(6)/5)) + pt1 = Point(half, half) + pt2 = Point(1, 1) + + '''Polygon to Point''' + assert p1.distance(pt1) == half + assert p1.distance(pt2) == 0 + assert p2.distance(pt1) == Rational(3)/4 + assert p3.distance(pt2) == sqrt(2)/2 + + '''Polygon to Polygon''' + # p1.distance(p2) emits a warning + with warns(UserWarning, \ + match="Polygons may intersect producing erroneous output"): + assert p1.distance(p2) == half/2 + + assert p1.distance(p3) == sqrt(2)/2 + + # p3.distance(p4) emits a warning + with warns(UserWarning, \ + match="Polygons may intersect producing erroneous output"): + assert p3.distance(p4) == (sqrt(2)/2 - sqrt(Rational(2)/25)/2) + + +def test_convex_hull(): + p = [Point(-5, -1), Point(-2, 1), Point(-2, -1), Point(-1, -3), \ + Point(0, 0), Point(1, 1), Point(2, 2), Point(2, -1), Point(3, 1), \ + Point(4, -1), Point(6, 2)] + ch = Polygon(p[0], p[3], p[9], p[10], p[6], p[1]) + #test handling of duplicate points + p.append(p[3]) + + #more than 3 collinear points + another_p = [Point(-45, -85), Point(-45, 85), Point(-45, 26), \ + Point(-45, -24)] + ch2 = Segment(another_p[0], another_p[1]) + + assert convex_hull(*another_p) == ch2 + assert convex_hull(*p) == ch + assert convex_hull(p[0]) == p[0] + assert convex_hull(p[0], p[1]) == Segment(p[0], p[1]) + + # no unique points + assert convex_hull(*[p[-1]]*3) == p[-1] + + # collection of items + assert convex_hull(*[Point(0, 0), \ + Segment(Point(1, 0), Point(1, 1)), \ + RegularPolygon(Point(2, 0), 2, 4)]) == \ + Polygon(Point(0, 0), Point(2, -2), Point(4, 0), Point(2, 2)) + + +def test_encloses(): + # square with a dimpled left side + s = Polygon(Point(0, 0), Point(1, 0), Point(1, 1), Point(0, 1), \ + Point(S.Half, S.Half)) + # the following is True if the polygon isn't treated as closing on itself + assert s.encloses(Point(0, S.Half)) is False + assert s.encloses(Point(S.Half, S.Half)) is False # it's a vertex + assert s.encloses(Point(Rational(3, 4), S.Half)) is True + + +def test_triangle_kwargs(): + assert Triangle(sss=(3, 4, 5)) == \ + Triangle(Point(0, 0), Point(3, 0), Point(3, 4)) + assert Triangle(asa=(30, 2, 30)) == \ + Triangle(Point(0, 0), Point(2, 0), Point(1, sqrt(3)/3)) + assert Triangle(sas=(1, 45, 2)) == \ + Triangle(Point(0, 0), Point(2, 0), Point(sqrt(2)/2, sqrt(2)/2)) + assert Triangle(sss=(1, 2, 5)) is None + assert deg(rad(180)) == 180 + + +def test_transform(): + pts = [Point(0, 0), Point(S.Half, Rational(1, 4)), Point(1, 1)] + pts_out = [Point(-4, -10), Point(-3, Rational(-37, 4)), Point(-2, -7)] + assert Triangle(*pts).scale(2, 3, (4, 5)) == Triangle(*pts_out) + assert RegularPolygon((0, 0), 1, 4).scale(2, 3, (4, 5)) == \ + Polygon(Point(-2, -10), Point(-4, -7), Point(-6, -10), Point(-4, -13)) + # Checks for symmetric scaling + assert RegularPolygon((0, 0), 1, 4).scale(2, 2) == \ + RegularPolygon(Point2D(0, 0), 2, 4, 0) + +def test_reflect(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + b = Symbol('b') + m = Symbol('m') + l = Line((0, b), slope=m) + p = Point(x, y) + r = p.reflect(l) + dp = l.perpendicular_segment(p).length + dr = l.perpendicular_segment(r).length + + assert verify_numerically(dp, dr) + + assert Polygon((1, 0), (2, 0), (2, 2)).reflect(Line((3, 0), slope=oo)) \ + == Triangle(Point(5, 0), Point(4, 0), Point(4, 2)) + assert Polygon((1, 0), (2, 0), (2, 2)).reflect(Line((0, 3), slope=oo)) \ + == Triangle(Point(-1, 0), Point(-2, 0), Point(-2, 2)) + assert Polygon((1, 0), (2, 0), (2, 2)).reflect(Line((0, 3), slope=0)) \ + == Triangle(Point(1, 6), Point(2, 6), Point(2, 4)) + assert Polygon((1, 0), (2, 0), (2, 2)).reflect(Line((3, 0), slope=0)) \ + == Triangle(Point(1, 0), Point(2, 0), Point(2, -2)) + +def test_bisectors(): + p1, p2, p3 = Point(0, 0), Point(1, 0), Point(0, 1) + p = Polygon(Point(0, 0), Point(2, 0), Point(1, 1), Point(0, 3)) + q = Polygon(Point(1, 0), Point(2, 0), Point(3, 3), Point(-1, 5)) + poly = Polygon(Point(3, 4), Point(0, 0), Point(8, 7), Point(-1, 1), Point(19, -19)) + t = Triangle(p1, p2, p3) + assert t.bisectors()[p2] == Segment(Point(1, 0), Point(0, sqrt(2) - 1)) + assert p.bisectors()[Point2D(0, 3)] == Ray2D(Point2D(0, 3), \ + Point2D(sin(acos(2*sqrt(5)/5)/2), 3 - cos(acos(2*sqrt(5)/5)/2))) + assert q.bisectors()[Point2D(-1, 5)] == \ + Ray2D(Point2D(-1, 5), Point2D(-1 + sqrt(29)*(5*sin(acos(9*sqrt(145)/145)/2) + \ + 2*cos(acos(9*sqrt(145)/145)/2))/29, sqrt(29)*(-5*cos(acos(9*sqrt(145)/145)/2) + \ + 2*sin(acos(9*sqrt(145)/145)/2))/29 + 5)) + assert poly.bisectors()[Point2D(-1, 1)] == Ray2D(Point2D(-1, 1), \ + Point2D(-1 + sin(acos(sqrt(26)/26)/2 + pi/4), 1 - sin(-acos(sqrt(26)/26)/2 + pi/4))) + +def test_incenter(): + assert Triangle(Point(0, 0), Point(1, 0), Point(0, 1)).incenter \ + == Point(1 - sqrt(2)/2, 1 - sqrt(2)/2) + +def test_inradius(): + assert Triangle(Point(0, 0), Point(4, 0), Point(0, 3)).inradius == 1 + +def test_incircle(): + assert Triangle(Point(0, 0), Point(2, 0), Point(0, 2)).incircle \ + == Circle(Point(2 - sqrt(2), 2 - sqrt(2)), 2 - sqrt(2)) + +def test_exradii(): + t = Triangle(Point(0, 0), Point(6, 0), Point(0, 2)) + assert t.exradii[t.sides[2]] == (-2 + sqrt(10)) + +def test_medians(): + t = Triangle(Point(0, 0), Point(1, 0), Point(0, 1)) + assert t.medians[Point(0, 0)] == Segment(Point(0, 0), Point(S.Half, S.Half)) + +def test_medial(): + assert Triangle(Point(0, 0), Point(1, 0), Point(0, 1)).medial \ + == Triangle(Point(S.Half, 0), Point(S.Half, S.Half), Point(0, S.Half)) + +def test_nine_point_circle(): + assert Triangle(Point(0, 0), Point(1, 0), Point(0, 1)).nine_point_circle \ + == Circle(Point2D(Rational(1, 4), Rational(1, 4)), sqrt(2)/4) + +def test_eulerline(): + assert Triangle(Point(0, 0), Point(1, 0), Point(0, 1)).eulerline \ + == Line(Point2D(0, 0), Point2D(S.Half, S.Half)) + assert Triangle(Point(0, 0), Point(10, 0), Point(5, 5*sqrt(3))).eulerline \ + == Point2D(5, 5*sqrt(3)/3) + assert Triangle(Point(4, -6), Point(4, -1), Point(-3, 3)).eulerline \ + == Line(Point2D(Rational(64, 7), 3), Point2D(Rational(-29, 14), Rational(-7, 2))) + +def test_intersection(): + poly1 = Triangle(Point(0, 0), Point(1, 0), Point(0, 1)) + poly2 = Polygon(Point(0, 1), Point(-5, 0), + Point(0, -4), Point(0, Rational(1, 5)), + Point(S.Half, -0.1), Point(1, 0), Point(0, 1)) + + assert poly1.intersection(poly2) == [Point2D(Rational(1, 3), 0), + Segment(Point(0, Rational(1, 5)), Point(0, 0)), + Segment(Point(1, 0), Point(0, 1))] + assert poly2.intersection(poly1) == [Point(Rational(1, 3), 0), + Segment(Point(0, 0), Point(0, Rational(1, 5))), + Segment(Point(1, 0), Point(0, 1))] + assert poly1.intersection(Point(0, 0)) == [Point(0, 0)] + assert poly1.intersection(Point(-12, -43)) == [] + assert poly2.intersection(Line((-12, 0), (12, 0))) == [Point(-5, 0), + Point(0, 0), Point(Rational(1, 3), 0), Point(1, 0)] + assert poly2.intersection(Line((-12, 12), (12, 12))) == [] + assert poly2.intersection(Ray((-3, 4), (1, 0))) == [Segment(Point(1, 0), + Point(0, 1))] + assert poly2.intersection(Circle((0, -1), 1)) == [Point(0, -2), + Point(0, 0)] + assert poly1.intersection(poly1) == [Segment(Point(0, 0), Point(1, 0)), + Segment(Point(0, 1), Point(0, 0)), Segment(Point(1, 0), Point(0, 1))] + assert poly2.intersection(poly2) == [Segment(Point(-5, 0), Point(0, -4)), + Segment(Point(0, -4), Point(0, Rational(1, 5))), + Segment(Point(0, Rational(1, 5)), Point(S.Half, Rational(-1, 10))), + Segment(Point(0, 1), Point(-5, 0)), + Segment(Point(S.Half, Rational(-1, 10)), Point(1, 0)), + Segment(Point(1, 0), Point(0, 1))] + assert poly2.intersection(Triangle(Point(0, 1), Point(1, 0), Point(-1, 1))) \ + == [Point(Rational(-5, 7), Rational(6, 7)), Segment(Point2D(0, 1), Point(1, 0))] + assert poly1.intersection(RegularPolygon((-12, -15), 3, 3)) == [] + + +def test_parameter_value(): + t = Symbol('t') + sq = Polygon((0, 0), (0, 1), (1, 1), (1, 0)) + assert sq.parameter_value((0.5, 1), t) == {t: Rational(3, 8)} + q = Polygon((0, 0), (2, 1), (2, 4), (4, 0)) + assert q.parameter_value((4, 0), t) == {t: -6 + 3*sqrt(5)} # ~= 0.708 + + raises(ValueError, lambda: sq.parameter_value((5, 6), t)) + raises(ValueError, lambda: sq.parameter_value(Circle(Point(0, 0), 1), t)) + + +def test_issue_12966(): + poly = Polygon(Point(0, 0), Point(0, 10), Point(5, 10), Point(5, 5), + Point(10, 5), Point(10, 0)) + t = Symbol('t') + pt = poly.arbitrary_point(t) + DELTA = 5/poly.perimeter + assert [pt.subs(t, DELTA*i) for i in range(int(1/DELTA))] == [ + Point(0, 0), Point(0, 5), Point(0, 10), Point(5, 10), + Point(5, 5), Point(10, 5), Point(10, 0), Point(5, 0)] + + +def test_second_moment_of_area(): + x, y = symbols('x, y') + # triangle + p1, p2, p3 = [(0, 0), (4, 0), (0, 2)] + p = (0, 0) + # equation of hypotenuse + eq_y = (1-x/4)*2 + I_yy = integrate((x**2) * (integrate(1, (y, 0, eq_y))), (x, 0, 4)) + I_xx = integrate(1 * (integrate(y**2, (y, 0, eq_y))), (x, 0, 4)) + I_xy = integrate(x * (integrate(y, (y, 0, eq_y))), (x, 0, 4)) + + triangle = Polygon(p1, p2, p3) + + assert (I_xx - triangle.second_moment_of_area(p)[0]) == 0 + assert (I_yy - triangle.second_moment_of_area(p)[1]) == 0 + assert (I_xy - triangle.second_moment_of_area(p)[2]) == 0 + + # rectangle + p1, p2, p3, p4=[(0, 0), (4, 0), (4, 2), (0, 2)] + I_yy = integrate((x**2) * integrate(1, (y, 0, 2)), (x, 0, 4)) + I_xx = integrate(1 * integrate(y**2, (y, 0, 2)), (x, 0, 4)) + I_xy = integrate(x * integrate(y, (y, 0, 2)), (x, 0, 4)) + + rectangle = Polygon(p1, p2, p3, p4) + + assert (I_xx - rectangle.second_moment_of_area(p)[0]) == 0 + assert (I_yy - rectangle.second_moment_of_area(p)[1]) == 0 + assert (I_xy - rectangle.second_moment_of_area(p)[2]) == 0 + + + r = RegularPolygon(Point(0, 0), 5, 3) + assert r.second_moment_of_area() == (1875*sqrt(3)/S(32), 1875*sqrt(3)/S(32), 0) + + +def test_first_moment(): + a, b = symbols('a, b', positive=True) + # rectangle + p1 = Polygon((0, 0), (a, 0), (a, b), (0, b)) + assert p1.first_moment_of_area() == (a*b**2/8, a**2*b/8) + assert p1.first_moment_of_area((a/3, b/4)) == (-3*a*b**2/32, -a**2*b/9) + + p1 = Polygon((0, 0), (40, 0), (40, 30), (0, 30)) + assert p1.first_moment_of_area() == (4500, 6000) + + # triangle + p2 = Polygon((0, 0), (a, 0), (a/2, b)) + assert p2.first_moment_of_area() == (4*a*b**2/81, a**2*b/24) + assert p2.first_moment_of_area((a/8, b/6)) == (-25*a*b**2/648, -5*a**2*b/768) + + p2 = Polygon((0, 0), (12, 0), (12, 30)) + assert p2.first_moment_of_area() == (S(1600)/3, -S(640)/3) + + +def test_section_modulus_and_polar_second_moment_of_area(): + a, b = symbols('a, b', positive=True) + x, y = symbols('x, y') + rectangle = Polygon((0, b), (0, 0), (a, 0), (a, b)) + assert rectangle.section_modulus(Point(x, y)) == (a*b**3/12/(-b/2 + y), a**3*b/12/(-a/2 + x)) + assert rectangle.polar_second_moment_of_area() == a**3*b/12 + a*b**3/12 + + convex = RegularPolygon((0, 0), 1, 6) + assert convex.section_modulus() == (Rational(5, 8), sqrt(3)*Rational(5, 16)) + assert convex.polar_second_moment_of_area() == 5*sqrt(3)/S(8) + + concave = Polygon((0, 0), (1, 8), (3, 4), (4, 6), (7, 1)) + assert concave.section_modulus() == (Rational(-6371, 429), Rational(-9778, 519)) + assert concave.polar_second_moment_of_area() == Rational(-38669, 252) + + +def test_cut_section(): + # concave polygon + p = Polygon((-1, -1), (1, Rational(5, 2)), (2, 1), (3, Rational(5, 2)), (4, 2), (5, 3), (-1, 3)) + l = Line((0, 0), (Rational(9, 2), 3)) + p1 = p.cut_section(l)[0] + p2 = p.cut_section(l)[1] + assert p1 == Polygon( + Point2D(Rational(-9, 13), Rational(-6, 13)), Point2D(1, Rational(5, 2)), Point2D(Rational(24, 13), Rational(16, 13)), + Point2D(Rational(12, 5), Rational(8, 5)), Point2D(3, Rational(5, 2)), Point2D(Rational(24, 7), Rational(16, 7)), + Point2D(Rational(9, 2), 3), Point2D(-1, 3), Point2D(-1, Rational(-2, 3))) + assert p2 == Polygon(Point2D(-1, -1), Point2D(Rational(-9, 13), Rational(-6, 13)), Point2D(Rational(24, 13), Rational(16, 13)), + Point2D(2, 1), Point2D(Rational(12, 5), Rational(8, 5)), Point2D(Rational(24, 7), Rational(16, 7)), Point2D(4, 2), Point2D(5, 3), + Point2D(Rational(9, 2), 3), Point2D(-1, Rational(-2, 3))) + + # convex polygon + p = RegularPolygon(Point2D(0, 0), 6, 6) + s = p.cut_section(Line((0, 0), slope=1)) + assert s[0] == Polygon(Point2D(-3*sqrt(3) + 9, -3*sqrt(3) + 9), Point2D(3, 3*sqrt(3)), + Point2D(-3, 3*sqrt(3)), Point2D(-6, 0), Point2D(-9 + 3*sqrt(3), -9 + 3*sqrt(3))) + assert s[1] == Polygon(Point2D(6, 0), Point2D(-3*sqrt(3) + 9, -3*sqrt(3) + 9), + Point2D(-9 + 3*sqrt(3), -9 + 3*sqrt(3)), Point2D(-3, -3*sqrt(3)), Point2D(3, -3*sqrt(3))) + + # case where line does not intersects but coincides with the edge of polygon + a, b = 20, 10 + t1, t2, t3, t4 = [(0, b), (0, 0), (a, 0), (a, b)] + p = Polygon(t1, t2, t3, t4) + p1, p2 = p.cut_section(Line((0, b), slope=0)) + assert p1 == None + assert p2 == Polygon(Point2D(0, 10), Point2D(0, 0), Point2D(20, 0), Point2D(20, 10)) + + p3, p4 = p.cut_section(Line((0, 0), slope=0)) + assert p3 == Polygon(Point2D(0, 10), Point2D(0, 0), Point2D(20, 0), Point2D(20, 10)) + assert p4 == None + + # case where the line does not intersect with a polygon at all + raises(ValueError, lambda: p.cut_section(Line((0, a), slope=0))) + +def test_type_of_triangle(): + # Isoceles triangle + p1 = Polygon(Point(0, 0), Point(5, 0), Point(2, 4)) + assert p1.is_isosceles() == True + assert p1.is_scalene() == False + assert p1.is_equilateral() == False + + # Scalene triangle + p2 = Polygon (Point(0, 0), Point(0, 2), Point(4, 0)) + assert p2.is_isosceles() == False + assert p2.is_scalene() == True + assert p2.is_equilateral() == False + + # Equilateral triangle + p3 = Polygon(Point(0, 0), Point(6, 0), Point(3, sqrt(27))) + assert p3.is_isosceles() == True + assert p3.is_scalene() == False + assert p3.is_equilateral() == True + +def test_do_poly_distance(): + # Non-intersecting polygons + square1 = Polygon (Point(0, 0), Point(0, 1), Point(1, 1), Point(1, 0)) + triangle1 = Polygon(Point(1, 2), Point(2, 2), Point(2, 1)) + assert square1._do_poly_distance(triangle1) == sqrt(2)/2 + + # Polygons which sides intersect + square2 = Polygon(Point(1, 0), Point(2, 0), Point(2, 1), Point(1, 1)) + with warns(UserWarning, \ + match="Polygons may intersect producing erroneous output", test_stacklevel=False): + assert square1._do_poly_distance(square2) == 0 + + # Polygons which bodies intersect + triangle2 = Polygon(Point(0, -1), Point(2, -1), Point(S.Half, S.Half)) + with warns(UserWarning, \ + match="Polygons may intersect producing erroneous output", test_stacklevel=False): + assert triangle2._do_poly_distance(square1) == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_util.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_util.py new file mode 100644 index 0000000000000000000000000000000000000000..da52a795a9383c6438ca06303e8ae6506dccdc65 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/tests/test_util.py @@ -0,0 +1,170 @@ +import pytest +from sympy.core.numbers import Float +from sympy.core.function import (Derivative, Function) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions import exp, cos, sin, tan, cosh, sinh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.geometry import Point, Point2D, Line, Polygon, Segment, convex_hull,\ + intersection, centroid, Point3D, Line3D, Ray, Ellipse +from sympy.geometry.util import idiff, closest_points, farthest_points, _ordered_points, are_coplanar +from sympy.solvers.solvers import solve +from sympy.testing.pytest import raises + + +def test_idiff(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + t = Symbol('t', real=True) + f = Function('f') + g = Function('g') + # the use of idiff in ellipse also provides coverage + circ = x**2 + y**2 - 4 + ans = -3*x*(x**2/y**2 + 1)/y**3 + assert ans == idiff(circ, y, x, 3), idiff(circ, y, x, 3) + assert ans == idiff(circ, [y], x, 3) + assert idiff(circ, y, x, 3) == ans + explicit = 12*x/sqrt(-x**2 + 4)**5 + assert ans.subs(y, solve(circ, y)[0]).equals(explicit) + assert True in [sol.diff(x, 3).equals(explicit) for sol in solve(circ, y)] + assert idiff(x + t + y, [y, t], x) == -Derivative(t, x) - 1 + assert idiff(f(x) * exp(f(x)) - x * exp(x), f(x), x) == (x + 1)*exp(x)*exp(-f(x))/(f(x) + 1) + assert idiff(f(x) - y * exp(x), [f(x), y], x) == (y + Derivative(y, x))*exp(x) + assert idiff(f(x) - y * exp(x), [y, f(x)], x) == -y + Derivative(f(x), x)*exp(-x) + assert idiff(f(x) - g(x), [f(x), g(x)], x) == Derivative(g(x), x) + # this should be fast + fxy = y - (-10*(-sin(x) + 1/x)**2 + tan(x)**2 + 2*cosh(x/10)) + assert idiff(fxy, y, x) == -20*sin(x)*cos(x) + 2*tan(x)**3 + \ + 2*tan(x) + sinh(x/10)/5 + 20*cos(x)/x - 20*sin(x)/x**2 + 20/x**3 + + +def test_intersection(): + assert intersection(Point(0, 0)) == [] + raises(TypeError, lambda: intersection(Point(0, 0), 3)) + assert intersection( + Segment((0, 0), (2, 0)), + Segment((-1, 0), (1, 0)), + Line((0, 0), (0, 1)), pairwise=True) == [ + Point(0, 0), Segment((0, 0), (1, 0))] + assert intersection( + Line((0, 0), (0, 1)), + Segment((0, 0), (2, 0)), + Segment((-1, 0), (1, 0)), pairwise=True) == [ + Point(0, 0), Segment((0, 0), (1, 0))] + assert intersection( + Line((0, 0), (0, 1)), + Segment((0, 0), (2, 0)), + Segment((-1, 0), (1, 0)), + Line((0, 0), slope=1), pairwise=True) == [ + Point(0, 0), Segment((0, 0), (1, 0))] + R = 4.0 + c = intersection( + Ray(Point2D(0.001, -1), + Point2D(0.0008, -1.7)), + Ellipse(center=Point2D(0, 0), hradius=R, vradius=2.0), pairwise=True)[0].coordinates + assert c == pytest.approx( + Point2D(0.000714285723396502, -1.99999996811224, evaluate=False).coordinates) + # check this is responds to a lower precision parameter + R = Float(4, 5) + c2 = intersection( + Ray(Point2D(0.001, -1), + Point2D(0.0008, -1.7)), + Ellipse(center=Point2D(0, 0), hradius=R, vradius=2.0), pairwise=True)[0].coordinates + assert c2 == pytest.approx( + Point2D(0.000714285723396502, -1.99999996811224, evaluate=False).coordinates) + assert c[0]._prec == 53 + assert c2[0]._prec == 20 + + +def test_convex_hull(): + raises(TypeError, lambda: convex_hull(Point(0, 0), 3)) + points = [(1, -1), (1, -2), (3, -1), (-5, -2), (15, -4)] + assert convex_hull(*points, **{"polygon": False}) == ( + [Point2D(-5, -2), Point2D(1, -1), Point2D(3, -1), Point2D(15, -4)], + [Point2D(-5, -2), Point2D(15, -4)]) + + +def test_centroid(): + p = Polygon((0, 0), (10, 0), (10, 10)) + q = p.translate(0, 20) + assert centroid(p, q) == Point(20, 40)/3 + p = Segment((0, 0), (2, 0)) + q = Segment((0, 0), (2, 2)) + assert centroid(p, q) == Point(1, -sqrt(2) + 2) + assert centroid(Point(0, 0), Point(2, 0)) == Point(2, 0)/2 + assert centroid(Point(0, 0), Point(0, 0), Point(2, 0)) == Point(2, 0)/3 + + +def test_farthest_points_closest_points(): + from sympy.core.random import randint + from sympy.utilities.iterables import subsets + + for how in (min, max): + if how == min: + func = closest_points + else: + func = farthest_points + + raises(ValueError, lambda: func(Point2D(0, 0), Point2D(0, 0))) + + # 3rd pt dx is close and pt is closer to 1st pt + p1 = [Point2D(0, 0), Point2D(3, 0), Point2D(1, 1)] + # 3rd pt dx is close and pt is closer to 2nd pt + p2 = [Point2D(0, 0), Point2D(3, 0), Point2D(2, 1)] + # 3rd pt dx is close and but pt is not closer + p3 = [Point2D(0, 0), Point2D(3, 0), Point2D(1, 10)] + # 3rd pt dx is not closer and it's closer to 2nd pt + p4 = [Point2D(0, 0), Point2D(3, 0), Point2D(4, 0)] + # 3rd pt dx is not closer and it's closer to 1st pt + p5 = [Point2D(0, 0), Point2D(3, 0), Point2D(-1, 0)] + # duplicate point doesn't affect outcome + dup = [Point2D(0, 0), Point2D(3, 0), Point2D(3, 0), Point2D(-1, 0)] + # symbolic + x = Symbol('x', positive=True) + s = [Point2D(a) for a in ((x, 1), (x + 3, 2), (x + 2, 2))] + + for points in (p1, p2, p3, p4, p5, dup, s): + d = how(i.distance(j) for i, j in subsets(set(points), 2)) + ans = a, b = list(func(*points))[0] + assert a.distance(b) == d + assert ans == _ordered_points(ans) + + # if the following ever fails, the above tests were not sufficient + # and the logical error in the routine should be fixed + points = set() + while len(points) != 7: + points.add(Point2D(randint(1, 100), randint(1, 100))) + points = list(points) + d = how(i.distance(j) for i, j in subsets(points, 2)) + ans = a, b = list(func(*points))[0] + assert a.distance(b) == d + assert ans == _ordered_points(ans) + + # equidistant points + a, b, c = ( + Point2D(0, 0), Point2D(1, 0), Point2D(S.Half, sqrt(3)/2)) + ans = {_ordered_points((i, j)) + for i, j in subsets((a, b, c), 2)} + assert closest_points(b, c, a) == ans + assert farthest_points(b, c, a) == ans + + # unique to farthest + points = [(1, 1), (1, 2), (3, 1), (-5, 2), (15, 4)] + assert farthest_points(*points) == { + (Point2D(-5, 2), Point2D(15, 4))} + points = [(1, -1), (1, -2), (3, -1), (-5, -2), (15, -4)] + assert farthest_points(*points) == { + (Point2D(-5, -2), Point2D(15, -4))} + assert farthest_points((1, 1), (0, 0)) == { + (Point2D(0, 0), Point2D(1, 1))} + raises(ValueError, lambda: farthest_points((1, 1))) + + +def test_are_coplanar(): + a = Line3D(Point3D(5, 0, 0), Point3D(1, -1, 1)) + b = Line3D(Point3D(0, -2, 0), Point3D(3, 1, 1)) + c = Line3D(Point3D(0, -1, 0), Point3D(5, -1, 9)) + d = Line(Point2D(0, 3), Point2D(1, 5)) + + assert are_coplanar(a, b, c) == False + assert are_coplanar(a, d) == False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/util.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/util.py new file mode 100644 index 0000000000000000000000000000000000000000..1d8fb77550f2faea8185ff0c373b5f1680e623ec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/geometry/util.py @@ -0,0 +1,731 @@ +"""Utility functions for geometrical entities. + +Contains +======== +intersection +convex_hull +closest_points +farthest_points +are_coplanar +are_similar + +""" + +from collections import deque +from math import sqrt as _sqrt + +from sympy import nsimplify +from .entity import GeometryEntity +from .exceptions import GeometryError +from .point import Point, Point2D, Point3D +from sympy.core.containers import OrderedSet +from sympy.core.exprtools import factor_terms +from sympy.core.function import Function, expand_mul +from sympy.core.numbers import Float +from sympy.core.sorting import ordered +from sympy.core.symbol import Symbol +from sympy.core.singleton import S +from sympy.polys.polytools import cancel +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.utilities.iterables import is_sequence + +from mpmath.libmp.libmpf import prec_to_dps + + +def find(x, equation): + """ + Checks whether a Symbol matching ``x`` is present in ``equation`` + or not. If present, the matching symbol is returned, else a + ValueError is raised. If ``x`` is a string the matching symbol + will have the same name; if ``x`` is a Symbol then it will be + returned if found. + + Examples + ======== + + >>> from sympy.geometry.util import find + >>> from sympy import Dummy + >>> from sympy.abc import x + >>> find('x', x) + x + >>> find('x', Dummy('x')) + _x + + The dummy symbol is returned since it has a matching name: + + >>> _.name == 'x' + True + >>> find(x, Dummy('x')) + Traceback (most recent call last): + ... + ValueError: could not find x + """ + + free = equation.free_symbols + xs = [i for i in free if (i.name if isinstance(x, str) else i) == x] + if not xs: + raise ValueError('could not find %s' % x) + if len(xs) != 1: + raise ValueError('ambiguous %s' % x) + return xs[0] + + +def _ordered_points(p): + """Return the tuple of points sorted numerically according to args""" + return tuple(sorted(p, key=lambda x: x.args)) + + +def are_coplanar(*e): + """ Returns True if the given entities are coplanar otherwise False + + Parameters + ========== + + e: entities to be checked for being coplanar + + Returns + ======= + + Boolean + + Examples + ======== + + >>> from sympy import Point3D, Line3D + >>> from sympy.geometry.util import are_coplanar + >>> a = Line3D(Point3D(5, 0, 0), Point3D(1, -1, 1)) + >>> b = Line3D(Point3D(0, -2, 0), Point3D(3, 1, 1)) + >>> c = Line3D(Point3D(0, -1, 0), Point3D(5, -1, 9)) + >>> are_coplanar(a, b, c) + False + + """ + from .line import LinearEntity3D + from .plane import Plane + # XXX update tests for coverage + + e = set(e) + # first work with a Plane if present + for i in list(e): + if isinstance(i, Plane): + e.remove(i) + return all(p.is_coplanar(i) for p in e) + + if all(isinstance(i, Point3D) for i in e): + if len(e) < 3: + return False + + # remove pts that are collinear with 2 pts + a, b = e.pop(), e.pop() + for i in list(e): + if Point3D.are_collinear(a, b, i): + e.remove(i) + + if not e: + return False + else: + # define a plane + p = Plane(a, b, e.pop()) + for i in e: + if i not in p: + return False + return True + else: + pt3d = [] + for i in e: + if isinstance(i, Point3D): + pt3d.append(i) + elif isinstance(i, LinearEntity3D): + pt3d.extend(i.args) + elif isinstance(i, GeometryEntity): # XXX we should have a GeometryEntity3D class so we can tell the difference between 2D and 3D -- here we just want to deal with 2D objects; if new 3D objects are encountered that we didn't handle above, an error should be raised + # all 2D objects have some Point that defines them; so convert those points to 3D pts by making z=0 + for p in i.args: + if isinstance(p, Point): + pt3d.append(Point3D(*(p.args + (0,)))) + return are_coplanar(*pt3d) + + +def are_similar(e1, e2): + """Are two geometrical entities similar. + + Can one geometrical entity be uniformly scaled to the other? + + Parameters + ========== + + e1 : GeometryEntity + e2 : GeometryEntity + + Returns + ======= + + are_similar : boolean + + Raises + ====== + + GeometryError + When `e1` and `e2` cannot be compared. + + Notes + ===== + + If the two objects are equal then they are similar. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity.is_similar + + Examples + ======== + + >>> from sympy import Point, Circle, Triangle, are_similar + >>> c1, c2 = Circle(Point(0, 0), 4), Circle(Point(1, 4), 3) + >>> t1 = Triangle(Point(0, 0), Point(1, 0), Point(0, 1)) + >>> t2 = Triangle(Point(0, 0), Point(2, 0), Point(0, 2)) + >>> t3 = Triangle(Point(0, 0), Point(3, 0), Point(0, 1)) + >>> are_similar(t1, t2) + True + >>> are_similar(t1, t3) + False + + """ + if e1 == e2: + return True + is_similar1 = getattr(e1, 'is_similar', None) + if is_similar1: + return is_similar1(e2) + is_similar2 = getattr(e2, 'is_similar', None) + if is_similar2: + return is_similar2(e1) + n1 = e1.__class__.__name__ + n2 = e2.__class__.__name__ + raise GeometryError( + "Cannot test similarity between %s and %s" % (n1, n2)) + + +def centroid(*args): + """Find the centroid (center of mass) of the collection containing only Points, + Segments or Polygons. The centroid is the weighted average of the individual centroid + where the weights are the lengths (of segments) or areas (of polygons). + Overlapping regions will add to the weight of that region. + + If there are no objects (or a mixture of objects) then None is returned. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.line.Segment, + sympy.geometry.polygon.Polygon + + Examples + ======== + + >>> from sympy import Point, Segment, Polygon + >>> from sympy.geometry.util import centroid + >>> p = Polygon((0, 0), (10, 0), (10, 10)) + >>> q = p.translate(0, 20) + >>> p.centroid, q.centroid + (Point2D(20/3, 10/3), Point2D(20/3, 70/3)) + >>> centroid(p, q) + Point2D(20/3, 40/3) + >>> p, q = Segment((0, 0), (2, 0)), Segment((0, 0), (2, 2)) + >>> centroid(p, q) + Point2D(1, 2 - sqrt(2)) + >>> centroid(Point(0, 0), Point(2, 0)) + Point2D(1, 0) + + Stacking 3 polygons on top of each other effectively triples the + weight of that polygon: + + >>> p = Polygon((0, 0), (1, 0), (1, 1), (0, 1)) + >>> q = Polygon((1, 0), (3, 0), (3, 1), (1, 1)) + >>> centroid(p, q) + Point2D(3/2, 1/2) + >>> centroid(p, p, p, q) # centroid x-coord shifts left + Point2D(11/10, 1/2) + + Stacking the squares vertically above and below p has the same + effect: + + >>> centroid(p, p.translate(0, 1), p.translate(0, -1), q) + Point2D(11/10, 1/2) + + """ + from .line import Segment + from .polygon import Polygon + if args: + if all(isinstance(g, Point) for g in args): + c = Point(0, 0) + for g in args: + c += g + den = len(args) + elif all(isinstance(g, Segment) for g in args): + c = Point(0, 0) + L = 0 + for g in args: + l = g.length + c += g.midpoint*l + L += l + den = L + elif all(isinstance(g, Polygon) for g in args): + c = Point(0, 0) + A = 0 + for g in args: + a = g.area + c += g.centroid*a + A += a + den = A + c /= den + return c.func(*[i.simplify() for i in c.args]) + + +def closest_points(*args): + """Return the subset of points from a set of points that were + the closest to each other in the 2D plane. + + Parameters + ========== + + args + A collection of Points on 2D plane. + + Notes + ===== + + This can only be performed on a set of points whose coordinates can + be ordered on the number line. If there are no ties then a single + pair of Points will be in the set. + + Examples + ======== + + >>> from sympy import closest_points, Triangle + >>> Triangle(sss=(3, 4, 5)).args + (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) + >>> closest_points(*_) + {(Point2D(0, 0), Point2D(3, 0))} + + References + ========== + + .. [1] https://www.cs.mcgill.ca/~cs251/ClosestPair/ClosestPairPS.html + + .. [2] Sweep line algorithm + https://en.wikipedia.org/wiki/Sweep_line_algorithm + + """ + p = [Point2D(i) for i in set(args)] + if len(p) < 2: + raise ValueError('At least 2 distinct points must be given.') + + try: + p.sort(key=lambda x: x.args) + except TypeError: + raise ValueError("The points could not be sorted.") + + if not all(i.is_Rational for j in p for i in j.args): + def hypot(x, y): + arg = x*x + y*y + if arg.is_Rational: + return _sqrt(arg) + return sqrt(arg) + else: + from math import hypot + + rv = [(0, 1)] + best_dist = hypot(p[1].x - p[0].x, p[1].y - p[0].y) + left = 0 + box = deque([0, 1]) + for i in range(2, len(p)): + while left < i and p[i][0] - p[left][0] > best_dist: + box.popleft() + left += 1 + + for j in box: + d = hypot(p[i].x - p[j].x, p[i].y - p[j].y) + if d < best_dist: + rv = [(j, i)] + elif d == best_dist: + rv.append((j, i)) + else: + continue + best_dist = d + box.append(i) + + return {tuple([p[i] for i in pair]) for pair in rv} + + +def convex_hull(*args, polygon=True): + """The convex hull surrounding the Points contained in the list of entities. + + Parameters + ========== + + args : a collection of Points, Segments and/or Polygons + + Optional parameters + =================== + + polygon : Boolean. If True, returns a Polygon, if false a tuple, see below. + Default is True. + + Returns + ======= + + convex_hull : Polygon if ``polygon`` is True else as a tuple `(U, L)` where + ``L`` and ``U`` are the lower and upper hulls, respectively. + + Notes + ===== + + This can only be performed on a set of points whose coordinates can + be ordered on the number line. + + See Also + ======== + + sympy.geometry.point.Point, sympy.geometry.polygon.Polygon + + Examples + ======== + + >>> from sympy import convex_hull + >>> points = [(1, 1), (1, 2), (3, 1), (-5, 2), (15, 4)] + >>> convex_hull(*points) + Polygon(Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)) + >>> convex_hull(*points, **dict(polygon=False)) + ([Point2D(-5, 2), Point2D(15, 4)], + [Point2D(-5, 2), Point2D(1, 1), Point2D(3, 1), Point2D(15, 4)]) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Graham_scan + + .. [2] Andrew's Monotone Chain Algorithm + (A.M. Andrew, + "Another Efficient Algorithm for Convex Hulls in Two Dimensions", 1979) + https://web.archive.org/web/20210511015444/http://geomalgorithms.com/a10-_hull-1.html + + """ + from .line import Segment + from .polygon import Polygon + p = OrderedSet() + for e in args: + if not isinstance(e, GeometryEntity): + try: + e = Point(e) + except NotImplementedError: + raise ValueError('%s is not a GeometryEntity and cannot be made into Point' % str(e)) + if isinstance(e, Point): + p.add(e) + elif isinstance(e, Segment): + p.update(e.points) + elif isinstance(e, Polygon): + p.update(e.vertices) + else: + raise NotImplementedError( + 'Convex hull for %s not implemented.' % type(e)) + + # make sure all our points are of the same dimension + if any(len(x) != 2 for x in p): + raise ValueError('Can only compute the convex hull in two dimensions') + + p = list(p) + if len(p) == 1: + return p[0] if polygon else (p[0], None) + elif len(p) == 2: + s = Segment(p[0], p[1]) + return s if polygon else (s, None) + + def _orientation(p, q, r): + '''Return positive if p-q-r are clockwise, neg if ccw, zero if + collinear.''' + return (q.y - p.y)*(r.x - p.x) - (q.x - p.x)*(r.y - p.y) + + # scan to find upper and lower convex hulls of a set of 2d points. + U = [] + L = [] + try: + p.sort(key=lambda x: x.args) + except TypeError: + raise ValueError("The points could not be sorted.") + for p_i in p: + while len(U) > 1 and _orientation(U[-2], U[-1], p_i) <= 0: + U.pop() + while len(L) > 1 and _orientation(L[-2], L[-1], p_i) >= 0: + L.pop() + U.append(p_i) + L.append(p_i) + U.reverse() + convexHull = tuple(L + U[1:-1]) + + if len(convexHull) == 2: + s = Segment(convexHull[0], convexHull[1]) + return s if polygon else (s, None) + if polygon: + return Polygon(*convexHull) + else: + U.reverse() + return (U, L) + +def farthest_points(*args): + """Return the subset of points from a set of points that were + the furthest apart from each other in the 2D plane. + + Parameters + ========== + + args + A collection of Points on 2D plane. + + Notes + ===== + + This can only be performed on a set of points whose coordinates can + be ordered on the number line. If there are no ties then a single + pair of Points will be in the set. + + Examples + ======== + + >>> from sympy.geometry import farthest_points, Triangle + >>> Triangle(sss=(3, 4, 5)).args + (Point2D(0, 0), Point2D(3, 0), Point2D(3, 4)) + >>> farthest_points(*_) + {(Point2D(0, 0), Point2D(3, 4))} + + References + ========== + + .. [1] https://code.activestate.com/recipes/117225-convex-hull-and-diameter-of-2d-point-sets/ + + .. [2] Rotating Callipers Technique + https://en.wikipedia.org/wiki/Rotating_calipers + + """ + + def rotatingCalipers(Points): + U, L = convex_hull(*Points, **{"polygon": False}) + + if L is None: + if isinstance(U, Point): + raise ValueError('At least two distinct points must be given.') + yield U.args + else: + i = 0 + j = len(L) - 1 + while i < len(U) - 1 or j > 0: + yield U[i], L[j] + # if all the way through one side of hull, advance the other side + if i == len(U) - 1: + j -= 1 + elif j == 0: + i += 1 + # still points left on both lists, compare slopes of next hull edges + # being careful to avoid divide-by-zero in slope calculation + elif (U[i+1].y - U[i].y) * (L[j].x - L[j-1].x) > \ + (L[j].y - L[j-1].y) * (U[i+1].x - U[i].x): + i += 1 + else: + j -= 1 + + p = [Point2D(i) for i in set(args)] + + if not all(i.is_Rational for j in p for i in j.args): + def hypot(x, y): + arg = x*x + y*y + if arg.is_Rational: + return _sqrt(arg) + return sqrt(arg) + else: + from math import hypot + + rv = [] + diam = 0 + for pair in rotatingCalipers(args): + h, q = _ordered_points(pair) + d = hypot(h.x - q.x, h.y - q.y) + if d > diam: + rv = [(h, q)] + elif d == diam: + rv.append((h, q)) + else: + continue + diam = d + + return set(rv) + + +def idiff(eq, y, x, n=1): + """Return ``dy/dx`` assuming that ``eq == 0``. + + Parameters + ========== + + y : the dependent variable or a list of dependent variables (with y first) + x : the variable that the derivative is being taken with respect to + n : the order of the derivative (default is 1) + + Examples + ======== + + >>> from sympy.abc import x, y, a + >>> from sympy.geometry.util import idiff + + >>> circ = x**2 + y**2 - 4 + >>> idiff(circ, y, x) + -x/y + >>> idiff(circ, y, x, 2).simplify() + (-x**2 - y**2)/y**3 + + Here, ``a`` is assumed to be independent of ``x``: + + >>> idiff(x + a + y, y, x) + -1 + + Now the x-dependence of ``a`` is made explicit by listing ``a`` after + ``y`` in a list. + + >>> idiff(x + a + y, [y, a], x) + -Derivative(a, x) - 1 + + See Also + ======== + + sympy.core.function.Derivative: represents unevaluated derivatives + sympy.core.function.diff: explicitly differentiates wrt symbols + + """ + if is_sequence(y): + dep = set(y) + y = y[0] + elif isinstance(y, Symbol): + dep = {y} + elif isinstance(y, Function): + pass + else: + raise ValueError("expecting x-dependent symbol(s) or function(s) but got: %s" % y) + + f = {s: Function(s.name)(x) for s in eq.free_symbols + if s != x and s in dep} + + if isinstance(y, Symbol): + dydx = Function(y.name)(x).diff(x) + else: + dydx = y.diff(x) + + eq = eq.subs(f) + derivs = {} + for i in range(n): + # equation will be linear in dydx, a*dydx + b, so dydx = -b/a + deq = eq.diff(x) + b = deq.xreplace({dydx: S.Zero}) + a = (deq - b).xreplace({dydx: S.One}) + yp = factor_terms(expand_mul(cancel((-b/a).subs(derivs)), deep=False)) + if i == n - 1: + return yp.subs([(v, k) for k, v in f.items()]) + derivs[dydx] = yp + eq = dydx - yp + dydx = dydx.diff(x) + + +def intersection(*entities, pairwise=False, **kwargs): + """The intersection of a collection of GeometryEntity instances. + + Parameters + ========== + entities : sequence of GeometryEntity + pairwise (keyword argument) : Can be either True or False + + Returns + ======= + intersection : list of GeometryEntity + + Raises + ====== + NotImplementedError + When unable to calculate intersection. + + Notes + ===== + The intersection of any geometrical entity with itself should return + a list with one item: the entity in question. + An intersection requires two or more entities. If only a single + entity is given then the function will return an empty list. + It is possible for `intersection` to miss intersections that one + knows exists because the required quantities were not fully + simplified internally. + Reals should be converted to Rationals, e.g. Rational(str(real_num)) + or else failures due to floating point issues may result. + + Case 1: When the keyword argument 'pairwise' is False (default value): + In this case, the function returns a list of intersections common to + all entities. + + Case 2: When the keyword argument 'pairwise' is True: + In this case, the functions returns a list intersections that occur + between any pair of entities. + + See Also + ======== + + sympy.geometry.entity.GeometryEntity.intersection + + Examples + ======== + + >>> from sympy import Ray, Circle, intersection + >>> c = Circle((0, 1), 1) + >>> intersection(c, c.center) + [] + >>> right = Ray((0, 0), (1, 0)) + >>> up = Ray((0, 0), (0, 1)) + >>> intersection(c, right, up) + [Point2D(0, 0)] + >>> intersection(c, right, up, pairwise=True) + [Point2D(0, 0), Point2D(0, 2)] + >>> left = Ray((1, 0), (0, 0)) + >>> intersection(right, left) + [Segment2D(Point2D(0, 0), Point2D(1, 0))] + + """ + if len(entities) <= 1: + return [] + + entities = list(entities) + prec = None + for i, e in enumerate(entities): + if not isinstance(e, GeometryEntity): + # entities may be an immutable tuple + e = Point(e) + # convert to exact Rationals + d = {} + for f in e.atoms(Float): + prec = f._prec if prec is None else min(f._prec, prec) + d.setdefault(f, nsimplify(f, rational=True)) + entities[i] = e.xreplace(d) + + if not pairwise: + # find the intersection common to all objects + res = entities[0].intersection(entities[1]) + for entity in entities[2:]: + newres = [] + for x in res: + newres.extend(x.intersection(entity)) + res = newres + else: + # find all pairwise intersections + ans = [] + for j in range(len(entities)): + for k in range(j + 1, len(entities)): + ans.extend(intersection(entities[j], entities[k])) + res = list(ordered(set(ans))) + + # convert back to Floats + if prec is not None: + p = prec_to_dps(prec) + res = [i.n(p) for i in res] + return res diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..1b3f043ada6222d79dd52fd28b035e2ea45c5683 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__init__.py @@ -0,0 +1,8 @@ +"""Helper module for setting up interactive SymPy sessions. """ + +from .printing import init_printing +from .session import init_session +from .traversal import interactive_traversal + + +__all__ = ['init_printing', 'init_session', 'interactive_traversal'] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..98355d7c02be032d8d7d9f322eaffd6e7e308a87 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/printing.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/printing.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..e4f311c6baced48308c8d6e260b64ad5c91466b5 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/printing.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/session.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/session.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..3a6e395d0764b680d3ab6451ebd5f5507c71cf56 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/session.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/traversal.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/traversal.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..a092568e14b1c998065c9f57803b94f084488c96 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/__pycache__/traversal.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/printing.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/printing.py new file mode 100644 index 0000000000000000000000000000000000000000..2fcc73e3e96a5b7e25f7fc7ebf54a5781c3b15b9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/printing.py @@ -0,0 +1,532 @@ +"""Tools for setting up printing in interactive sessions. """ + +from io import BytesIO + +from sympy.printing.latex import latex as default_latex +from sympy.printing.preview import preview +from sympy.utilities.misc import debug +from sympy.printing.defaults import Printable +from sympy.external import import_module + + +def _init_python_printing(stringify_func, **settings): + """Setup printing in Python interactive session. """ + import sys + import builtins + + def _displayhook(arg): + """Python's pretty-printer display hook. + + This function was adapted from: + + https://www.python.org/dev/peps/pep-0217/ + + """ + if arg is not None: + builtins._ = None + print(stringify_func(arg, **settings)) + builtins._ = arg + + sys.displayhook = _displayhook + + +def _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor, + backcolor, fontsize, latex_mode, print_builtin, + latex_printer, scale, **settings): + """Setup printing in IPython interactive session. """ + IPython = import_module("IPython", min_module_version="1.0") + try: + from IPython.lib.latextools import latex_to_png + except ImportError: + pass + + # Guess best font color if none was given based on the ip.colors string. + # From the IPython documentation: + # It has four case-insensitive values: 'nocolor', 'neutral', 'linux', + # 'lightbg'. The default is neutral, which should be legible on either + # dark or light terminal backgrounds. linux is optimised for dark + # backgrounds and lightbg for light ones. + if forecolor is None: + color = ip.colors.lower() + if color == 'lightbg': + forecolor = 'Black' + elif color == 'linux': + forecolor = 'White' + else: + # No idea, go with gray. + forecolor = 'Gray' + debug("init_printing: Automatic foreground color:", forecolor) + + if use_latex == "svg": + extra_preamble = "\n\\special{color %s}" % forecolor + else: + extra_preamble = "" + + imagesize = 'tight' + offset = "0cm,0cm" + resolution = round(150*scale) + dvi = r"-T %s -D %d -bg %s -fg %s -O %s" % ( + imagesize, resolution, backcolor, forecolor, offset) + dvioptions = dvi.split() + + svg_scale = 150/72*scale + dvioptions_svg = ["--no-fonts", "--scale={}".format(svg_scale)] + + debug("init_printing: DVIOPTIONS:", dvioptions) + debug("init_printing: DVIOPTIONS_SVG:", dvioptions_svg) + + latex = latex_printer or default_latex + + def _print_plain(arg, p, cycle): + """caller for pretty, for use in IPython 0.11""" + if _can_print(arg): + p.text(stringify_func(arg)) + else: + p.text(IPython.lib.pretty.pretty(arg)) + + def _preview_wrapper(o): + exprbuffer = BytesIO() + try: + preview(o, output='png', viewer='BytesIO', euler=euler, + outputbuffer=exprbuffer, extra_preamble=extra_preamble, + dvioptions=dvioptions, fontsize=fontsize) + except Exception as e: + # IPython swallows exceptions + debug("png printing:", "_preview_wrapper exception raised:", + repr(e)) + raise + return exprbuffer.getvalue() + + def _svg_wrapper(o): + exprbuffer = BytesIO() + try: + preview(o, output='svg', viewer='BytesIO', euler=euler, + outputbuffer=exprbuffer, extra_preamble=extra_preamble, + dvioptions=dvioptions_svg, fontsize=fontsize) + except Exception as e: + # IPython swallows exceptions + debug("svg printing:", "_preview_wrapper exception raised:", + repr(e)) + raise + return exprbuffer.getvalue().decode('utf-8') + + def _matplotlib_wrapper(o): + # mathtext can't render some LaTeX commands. For example, it can't + # render any LaTeX environments such as array or matrix. So here we + # ensure that if mathtext fails to render, we return None. + try: + try: + return latex_to_png(o, color=forecolor, scale=scale) + except TypeError: # Old IPython version without color and scale + return latex_to_png(o) + except ValueError as e: + debug('matplotlib exception caught:', repr(e)) + return None + + + # Hook methods for builtin SymPy printers + printing_hooks = ('_latex', '_sympystr', '_pretty', '_sympyrepr') + + + def _can_print(o): + """Return True if type o can be printed with one of the SymPy printers. + + If o is a container type, this is True if and only if every element of + o can be printed in this way. + """ + + try: + # If you're adding another type, make sure you add it to printable_types + # later in this file as well + + builtin_types = (list, tuple, set, frozenset) + if isinstance(o, builtin_types): + # If the object is a custom subclass with a custom str or + # repr, use that instead. + if (type(o).__str__ not in (i.__str__ for i in builtin_types) or + type(o).__repr__ not in (i.__repr__ for i in builtin_types)): + return False + return all(_can_print(i) for i in o) + elif isinstance(o, dict): + return all(_can_print(i) and _can_print(o[i]) for i in o) + elif isinstance(o, bool): + return False + elif isinstance(o, Printable): + # types known to SymPy + return True + elif any(hasattr(o, hook) for hook in printing_hooks): + # types which add support themselves + return True + elif isinstance(o, (float, int)) and print_builtin: + return True + return False + except RuntimeError: + return False + # This is in case maximum recursion depth is reached. + # Since RecursionError is for versions of Python 3.5+ + # so this is to guard against RecursionError for older versions. + + def _print_latex_png(o): + """ + A function that returns a png rendered by an external latex + distribution, falling back to matplotlib rendering + """ + if _can_print(o): + s = latex(o, mode=latex_mode, **settings) + if latex_mode == 'plain': + s = '$\\displaystyle %s$' % s + try: + return _preview_wrapper(s) + except RuntimeError as e: + debug('preview failed with:', repr(e), + ' Falling back to matplotlib backend') + if latex_mode != 'inline': + s = latex(o, mode='inline', **settings) + return _matplotlib_wrapper(s) + + def _print_latex_svg(o): + """ + A function that returns a svg rendered by an external latex + distribution, no fallback available. + """ + if _can_print(o): + s = latex(o, mode=latex_mode, **settings) + if latex_mode == 'plain': + s = '$\\displaystyle %s$' % s + try: + return _svg_wrapper(s) + except RuntimeError as e: + debug('preview failed with:', repr(e), + ' No fallback available.') + + def _print_latex_matplotlib(o): + """ + A function that returns a png rendered by mathtext + """ + if _can_print(o): + s = latex(o, mode='inline', **settings) + return _matplotlib_wrapper(s) + + def _print_latex_text(o): + """ + A function to generate the latex representation of SymPy expressions. + """ + if _can_print(o): + s = latex(o, mode=latex_mode, **settings) + if latex_mode == 'plain': + return '$\\displaystyle %s$' % s + return s + + # Printable is our own type, so we handle it with methods instead of + # the approach required by builtin types. This allows downstream + # packages to override the methods in their own subclasses of Printable, + # which avoids the effects of gh-16002. + printable_types = [float, tuple, list, set, frozenset, dict, int] + + plaintext_formatter = ip.display_formatter.formatters['text/plain'] + + # Exception to the rule above: IPython has better dispatching rules + # for plaintext printing (xref ipython/ipython#8938), and we can't + # use `_repr_pretty_` without hitting a recursion error in _print_plain. + for cls in printable_types + [Printable]: + plaintext_formatter.for_type(cls, _print_plain) + + svg_formatter = ip.display_formatter.formatters['image/svg+xml'] + if use_latex in ('svg', ): + debug("init_printing: using svg formatter") + for cls in printable_types: + svg_formatter.for_type(cls, _print_latex_svg) + Printable._repr_svg_ = _print_latex_svg + else: + debug("init_printing: not using any svg formatter") + for cls in printable_types: + # Better way to set this, but currently does not work in IPython + #png_formatter.for_type(cls, None) + if cls in svg_formatter.type_printers: + svg_formatter.type_printers.pop(cls) + Printable._repr_svg_ = Printable._repr_disabled + + png_formatter = ip.display_formatter.formatters['image/png'] + if use_latex in (True, 'png'): + debug("init_printing: using png formatter") + for cls in printable_types: + png_formatter.for_type(cls, _print_latex_png) + Printable._repr_png_ = _print_latex_png + elif use_latex == 'matplotlib': + debug("init_printing: using matplotlib formatter") + for cls in printable_types: + png_formatter.for_type(cls, _print_latex_matplotlib) + Printable._repr_png_ = _print_latex_matplotlib + else: + debug("init_printing: not using any png formatter") + for cls in printable_types: + # Better way to set this, but currently does not work in IPython + #png_formatter.for_type(cls, None) + if cls in png_formatter.type_printers: + png_formatter.type_printers.pop(cls) + Printable._repr_png_ = Printable._repr_disabled + + latex_formatter = ip.display_formatter.formatters['text/latex'] + if use_latex in (True, 'mathjax'): + debug("init_printing: using mathjax formatter") + for cls in printable_types: + latex_formatter.for_type(cls, _print_latex_text) + Printable._repr_latex_ = _print_latex_text + else: + debug("init_printing: not using text/latex formatter") + for cls in printable_types: + # Better way to set this, but currently does not work in IPython + #latex_formatter.for_type(cls, None) + if cls in latex_formatter.type_printers: + latex_formatter.type_printers.pop(cls) + Printable._repr_latex_ = Printable._repr_disabled + +def _is_ipython(shell): + """Is a shell instance an IPython shell?""" + # shortcut, so we don't import IPython if we don't have to + from sys import modules + if 'IPython' not in modules: + return False + try: + from IPython.core.interactiveshell import InteractiveShell + except ImportError: + # IPython < 0.11 + try: + from IPython.iplib import InteractiveShell + except ImportError: + # Reaching this points means IPython has changed in a backward-incompatible way + # that we don't know about. Warn? + return False + return isinstance(shell, InteractiveShell) + +# Used by the doctester to override the default for no_global +NO_GLOBAL = False + +def init_printing(pretty_print=True, order=None, use_unicode=None, + use_latex=None, wrap_line=None, num_columns=None, + no_global=False, ip=None, euler=False, forecolor=None, + backcolor='Transparent', fontsize='10pt', + latex_mode='plain', print_builtin=True, + str_printer=None, pretty_printer=None, + latex_printer=None, scale=1.0, **settings): + r""" + Initializes pretty-printer depending on the environment. + + Parameters + ========== + + pretty_print : bool, default=True + If ``True``, use :func:`~.pretty_print` to stringify or the provided pretty + printer; if ``False``, use :func:`~.sstrrepr` to stringify or the provided string + printer. + order : string or None, default='lex' + There are a few different settings for this parameter: + ``'lex'`` (default), which is lexographic order; + ``'grlex'``, which is graded lexographic order; + ``'grevlex'``, which is reversed graded lexographic order; + ``'old'``, which is used for compatibility reasons and for long expressions; + ``None``, which sets it to lex. + use_unicode : bool or None, default=None + If ``True``, use unicode characters; + if ``False``, do not use unicode characters; + if ``None``, make a guess based on the environment. + use_latex : string, bool, or None, default=None + If ``True``, use default LaTeX rendering in GUI interfaces (png and + mathjax); + if ``False``, do not use LaTeX rendering; + if ``None``, make a guess based on the environment; + if ``'png'``, enable LaTeX rendering with an external LaTeX compiler, + falling back to matplotlib if external compilation fails; + if ``'matplotlib'``, enable LaTeX rendering with matplotlib; + if ``'mathjax'``, enable LaTeX text generation, for example MathJax + rendering in IPython notebook or text rendering in LaTeX documents; + if ``'svg'``, enable LaTeX rendering with an external latex compiler, + no fallback + wrap_line : bool + If True, lines will wrap at the end; if False, they will not wrap + but continue as one line. This is only relevant if ``pretty_print`` is + True. + num_columns : int or None, default=None + If ``int``, number of columns before wrapping is set to num_columns; if + ``None``, number of columns before wrapping is set to terminal width. + This is only relevant if ``pretty_print`` is ``True``. + no_global : bool, default=False + If ``True``, the settings become system wide; + if ``False``, use just for this console/session. + ip : An interactive console + This can either be an instance of IPython, + or a class that derives from code.InteractiveConsole. + euler : bool, optional, default=False + Loads the euler package in the LaTeX preamble for handwritten style + fonts (https://www.ctan.org/pkg/euler). + forecolor : string or None, optional, default=None + DVI setting for foreground color. ``None`` means that either ``'Black'``, + ``'White'``, or ``'Gray'`` will be selected based on a guess of the IPython + terminal color setting. See notes. + backcolor : string, optional, default='Transparent' + DVI setting for background color. See notes. + fontsize : string or int, optional, default='10pt' + A font size to pass to the LaTeX documentclass function in the + preamble. Note that the options are limited by the documentclass. + Consider using scale instead. + latex_mode : string, optional, default='plain' + The mode used in the LaTeX printer. Can be one of: + ``{'inline'|'plain'|'equation'|'equation*'}``. + print_builtin : boolean, optional, default=True + If ``True`` then floats and integers will be printed. If ``False`` the + printer will only print SymPy types. + str_printer : function, optional, default=None + A custom string printer function. This should mimic + :func:`~.sstrrepr`. + pretty_printer : function, optional, default=None + A custom pretty printer. This should mimic :func:`~.pretty`. + latex_printer : function, optional, default=None + A custom LaTeX printer. This should mimic :func:`~.latex`. + scale : float, optional, default=1.0 + Scale the LaTeX output when using the ``'png'`` or ``'svg'`` backends. + Useful for high dpi screens. + settings : + Any additional settings for the ``latex`` and ``pretty`` commands can + be used to fine-tune the output. + + Examples + ======== + + >>> from sympy.interactive import init_printing + >>> from sympy import Symbol, sqrt + >>> from sympy.abc import x, y + >>> sqrt(5) + sqrt(5) + >>> init_printing(pretty_print=True) # doctest: +SKIP + >>> sqrt(5) # doctest: +SKIP + ___ + \/ 5 + >>> theta = Symbol('theta') # doctest: +SKIP + >>> init_printing(use_unicode=True) # doctest: +SKIP + >>> theta # doctest: +SKIP + \u03b8 + >>> init_printing(use_unicode=False) # doctest: +SKIP + >>> theta # doctest: +SKIP + theta + >>> init_printing(order='lex') # doctest: +SKIP + >>> str(y + x + y**2 + x**2) # doctest: +SKIP + x**2 + x + y**2 + y + >>> init_printing(order='grlex') # doctest: +SKIP + >>> str(y + x + y**2 + x**2) # doctest: +SKIP + x**2 + x + y**2 + y + >>> init_printing(order='grevlex') # doctest: +SKIP + >>> str(y * x**2 + x * y**2) # doctest: +SKIP + x**2*y + x*y**2 + >>> init_printing(order='old') # doctest: +SKIP + >>> str(x**2 + y**2 + x + y) # doctest: +SKIP + x**2 + x + y**2 + y + >>> init_printing(num_columns=10) # doctest: +SKIP + >>> x**2 + x + y**2 + y # doctest: +SKIP + x + y + + x**2 + y**2 + + Notes + ===== + + The foreground and background colors can be selected when using ``'png'`` or + ``'svg'`` LaTeX rendering. Note that before the ``init_printing`` command is + executed, the LaTeX rendering is handled by the IPython console and not SymPy. + + The colors can be selected among the 68 standard colors known to ``dvips``, + for a list see [1]_. In addition, the background color can be + set to ``'Transparent'`` (which is the default value). + + When using the ``'Auto'`` foreground color, the guess is based on the + ``colors`` variable in the IPython console, see [2]_. Hence, if + that variable is set correctly in your IPython console, there is a high + chance that the output will be readable, although manual settings may be + needed. + + + References + ========== + + .. [1] https://en.wikibooks.org/wiki/LaTeX/Colors#The_68_standard_colors_known_to_dvips + + .. [2] https://ipython.readthedocs.io/en/stable/config/details.html#terminal-colors + + See Also + ======== + + sympy.printing.latex + sympy.printing.pretty + + """ + import sys + from sympy.printing.printer import Printer + + if pretty_print: + if pretty_printer is not None: + stringify_func = pretty_printer + else: + from sympy.printing import pretty as stringify_func + else: + if str_printer is not None: + stringify_func = str_printer + else: + from sympy.printing import sstrrepr as stringify_func + + # Even if ip is not passed, double check that not in IPython shell + in_ipython = False + if ip is None: + try: + ip = get_ipython() + except NameError: + pass + else: + in_ipython = (ip is not None) + + if ip and not in_ipython: + in_ipython = _is_ipython(ip) + + if in_ipython and pretty_print: + try: + from IPython.terminal.interactiveshell import TerminalInteractiveShell + from code import InteractiveConsole + except ImportError: + pass + else: + # This will be True if we are in the qtconsole or notebook + if not isinstance(ip, (InteractiveConsole, TerminalInteractiveShell)) \ + and 'ipython-console' not in ''.join(sys.argv): + if use_unicode is None: + debug("init_printing: Setting use_unicode to True") + use_unicode = True + if use_latex is None: + debug("init_printing: Setting use_latex to True") + use_latex = True + + if not NO_GLOBAL and not no_global: + Printer.set_global_settings(order=order, use_unicode=use_unicode, + wrap_line=wrap_line, num_columns=num_columns) + else: + _stringify_func = stringify_func + + if pretty_print: + stringify_func = lambda expr, **settings: \ + _stringify_func(expr, order=order, + use_unicode=use_unicode, + wrap_line=wrap_line, + num_columns=num_columns, + **settings) + else: + stringify_func = \ + lambda expr, **settings: _stringify_func( + expr, order=order, **settings) + + if in_ipython: + mode_in_settings = settings.pop("mode", None) + if mode_in_settings: + debug("init_printing: Mode is not able to be set due to internals" + "of IPython printing") + _init_ipython_printing(ip, stringify_func, use_latex, euler, + forecolor, backcolor, fontsize, latex_mode, + print_builtin, latex_printer, scale, + **settings) + else: + _init_python_printing(stringify_func, **settings) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/session.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/session.py new file mode 100644 index 0000000000000000000000000000000000000000..348b0938d69e5e7ffa9510f7d9ac759eb6683b8f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/session.py @@ -0,0 +1,463 @@ +"""Tools for setting up interactive sessions. """ + +from sympy.external.gmpy import GROUND_TYPES +from sympy.external.importtools import version_tuple + +from sympy.interactive.printing import init_printing + +from sympy.utilities.misc import ARCH + +preexec_source = """\ +from sympy import * +x, y, z, t = symbols('x y z t') +k, m, n = symbols('k m n', integer=True) +f, g, h = symbols('f g h', cls=Function) +init_printing() +""" + +verbose_message = """\ +These commands were executed: +%(source)s +Documentation can be found at https://docs.sympy.org/%(version)s +""" + +no_ipython = """\ +Could not locate IPython. Having IPython installed is greatly recommended. +See http://ipython.scipy.org for more details. If you use Debian/Ubuntu, +just install the 'ipython' package and start isympy again. +""" + + +def _make_message(ipython=True, quiet=False, source=None): + """Create a banner for an interactive session. """ + from sympy import __version__ as sympy_version + from sympy import SYMPY_DEBUG + + import sys + import os + + if quiet: + return "" + + python_version = "%d.%d.%d" % sys.version_info[:3] + + if ipython: + shell_name = "IPython" + else: + shell_name = "Python" + + info = ['ground types: %s' % GROUND_TYPES] + + cache = os.getenv('SYMPY_USE_CACHE') + + if cache is not None and cache.lower() == 'no': + info.append('cache: off') + + if SYMPY_DEBUG: + info.append('debugging: on') + + args = shell_name, sympy_version, python_version, ARCH, ', '.join(info) + message = "%s console for SymPy %s (Python %s-%s) (%s)\n" % args + + if source is None: + source = preexec_source + + _source = "" + + for line in source.split('\n')[:-1]: + if not line: + _source += '\n' + else: + _source += '>>> ' + line + '\n' + + doc_version = sympy_version + if 'dev' in doc_version: + doc_version = "dev" + else: + doc_version = "%s/" % doc_version + + message += '\n' + verbose_message % {'source': _source, + 'version': doc_version} + + return message + + +def int_to_Integer(s): + """ + Wrap integer literals with Integer. + + This is based on the decistmt example from + https://docs.python.org/3/library/tokenize.html. + + Only integer literals are converted. Float literals are left alone. + + Examples + ======== + + >>> from sympy import Integer # noqa: F401 + >>> from sympy.interactive.session import int_to_Integer + >>> s = '1.2 + 1/2 - 0x12 + a1' + >>> int_to_Integer(s) + '1.2 +Integer (1 )/Integer (2 )-Integer (0x12 )+a1 ' + >>> s = 'print (1/2)' + >>> int_to_Integer(s) + 'print (Integer (1 )/Integer (2 ))' + >>> exec(s) + 0.5 + >>> exec(int_to_Integer(s)) + 1/2 + """ + from tokenize import generate_tokens, untokenize, NUMBER, NAME, OP + from io import StringIO + + def _is_int(num): + """ + Returns true if string value num (with token NUMBER) represents an integer. + """ + # XXX: Is there something in the standard library that will do this? + if '.' in num or 'j' in num.lower() or 'e' in num.lower(): + return False + return True + + result = [] + g = generate_tokens(StringIO(s).readline) # tokenize the string + for toknum, tokval, _, _, _ in g: + if toknum == NUMBER and _is_int(tokval): # replace NUMBER tokens + result.extend([ + (NAME, 'Integer'), + (OP, '('), + (NUMBER, tokval), + (OP, ')') + ]) + else: + result.append((toknum, tokval)) + return untokenize(result) + + +def enable_automatic_int_sympification(shell): + """ + Allow IPython to automatically convert integer literals to Integer. + """ + import ast + old_run_cell = shell.run_cell + + def my_run_cell(cell, *args, **kwargs): + try: + # Check the cell for syntax errors. This way, the syntax error + # will show the original input, not the transformed input. The + # downside here is that IPython magic like %timeit will not work + # with transformed input (but on the other hand, IPython magic + # that doesn't expect transformed input will continue to work). + ast.parse(cell) + except SyntaxError: + pass + else: + cell = int_to_Integer(cell) + return old_run_cell(cell, *args, **kwargs) + + shell.run_cell = my_run_cell + + +def enable_automatic_symbols(shell): + """Allow IPython to automatically create symbols (``isympy -a``). """ + # XXX: This should perhaps use tokenize, like int_to_Integer() above. + # This would avoid re-executing the code, which can lead to subtle + # issues. For example: + # + # In [1]: a = 1 + # + # In [2]: for i in range(10): + # ...: a += 1 + # ...: + # + # In [3]: a + # Out[3]: 11 + # + # In [4]: a = 1 + # + # In [5]: for i in range(10): + # ...: a += 1 + # ...: print b + # ...: + # b + # b + # b + # b + # b + # b + # b + # b + # b + # b + # + # In [6]: a + # Out[6]: 12 + # + # Note how the for loop is executed again because `b` was not defined, but `a` + # was already incremented once, so the result is that it is incremented + # multiple times. + + import re + re_nameerror = re.compile( + "name '(?P[A-Za-z_][A-Za-z0-9_]*)' is not defined") + + def _handler(self, etype, value, tb, tb_offset=None): + """Handle :exc:`NameError` exception and allow injection of missing symbols. """ + if etype is NameError and tb.tb_next and not tb.tb_next.tb_next: + match = re_nameerror.match(str(value)) + + if match is not None: + # XXX: Make sure Symbol is in scope. Otherwise you'll get infinite recursion. + self.run_cell("%(symbol)s = Symbol('%(symbol)s')" % + {'symbol': match.group("symbol")}, store_history=False) + + try: + code = self.user_ns['In'][-1] + except (KeyError, IndexError): + pass + else: + self.run_cell(code, store_history=False) + return None + finally: + self.run_cell("del %s" % match.group("symbol"), + store_history=False) + + stb = self.InteractiveTB.structured_traceback( + etype, value, tb, tb_offset=tb_offset) + self._showtraceback(etype, value, stb) + + shell.set_custom_exc((NameError,), _handler) + + +def init_ipython_session(shell=None, argv=[], auto_symbols=False, auto_int_to_Integer=False): + """Construct new IPython session. """ + import IPython + + if version_tuple(IPython.__version__) >= version_tuple('0.11'): + if not shell: + # use an app to parse the command line, and init config + # IPython 1.0 deprecates the frontend module, so we import directly + # from the terminal module to prevent a deprecation message from being + # shown. + if version_tuple(IPython.__version__) >= version_tuple('1.0'): + from IPython.terminal import ipapp + else: + from IPython.frontend.terminal import ipapp + app = ipapp.TerminalIPythonApp() + + # don't draw IPython banner during initialization: + app.display_banner = False + app.initialize(argv) + + shell = app.shell + + if auto_symbols: + enable_automatic_symbols(shell) + if auto_int_to_Integer: + enable_automatic_int_sympification(shell) + + return shell + else: + from IPython.Shell import make_IPython + return make_IPython(argv) + + +def init_python_session(): + """Construct new Python session. """ + from code import InteractiveConsole + + class SymPyConsole(InteractiveConsole): + """An interactive console with readline support. """ + + def __init__(self): + ns_locals = {} + InteractiveConsole.__init__(self, locals=ns_locals) + try: + import rlcompleter + import readline + except ImportError: + pass + else: + import os + import atexit + + readline.set_completer(rlcompleter.Completer(ns_locals).complete) + readline.parse_and_bind('tab: complete') + + if hasattr(readline, 'read_history_file'): + history = os.path.expanduser('~/.sympy-history') + + try: + readline.read_history_file(history) + except OSError: + pass + + atexit.register(readline.write_history_file, history) + + return SymPyConsole() + + +def init_session(ipython=None, pretty_print=True, order=None, + use_unicode=None, use_latex=None, quiet=False, auto_symbols=False, + auto_int_to_Integer=False, str_printer=None, pretty_printer=None, + latex_printer=None, argv=[]): + """ + Initialize an embedded IPython or Python session. The IPython session is + initiated with the --pylab option, without the numpy imports, so that + matplotlib plotting can be interactive. + + Parameters + ========== + + pretty_print: boolean + If True, use pretty_print to stringify; + if False, use sstrrepr to stringify. + order: string or None + There are a few different settings for this parameter: + lex (default), which is lexographic order; + grlex, which is graded lexographic order; + grevlex, which is reversed graded lexographic order; + old, which is used for compatibility reasons and for long expressions; + None, which sets it to lex. + use_unicode: boolean or None + If True, use unicode characters; + if False, do not use unicode characters. + use_latex: boolean or None + If True, use latex rendering if IPython GUI's; + if False, do not use latex rendering. + quiet: boolean + If True, init_session will not print messages regarding its status; + if False, init_session will print messages regarding its status. + auto_symbols: boolean + If True, IPython will automatically create symbols for you. + If False, it will not. + The default is False. + auto_int_to_Integer: boolean + If True, IPython will automatically wrap int literals with Integer, so + that things like 1/2 give Rational(1, 2). + If False, it will not. + The default is False. + ipython: boolean or None + If True, printing will initialize for an IPython console; + if False, printing will initialize for a normal console; + The default is None, which automatically determines whether we are in + an ipython instance or not. + str_printer: function, optional, default=None + A custom string printer function. This should mimic + sympy.printing.sstrrepr(). + pretty_printer: function, optional, default=None + A custom pretty printer. This should mimic sympy.printing.pretty(). + latex_printer: function, optional, default=None + A custom LaTeX printer. This should mimic sympy.printing.latex() + This should mimic sympy.printing.latex(). + argv: list of arguments for IPython + See sympy.bin.isympy for options that can be used to initialize IPython. + + See Also + ======== + + sympy.interactive.printing.init_printing: for examples and the rest of the parameters. + + + Examples + ======== + + >>> from sympy import init_session, Symbol, sin, sqrt + >>> sin(x) #doctest: +SKIP + NameError: name 'x' is not defined + >>> init_session() #doctest: +SKIP + >>> sin(x) #doctest: +SKIP + sin(x) + >>> sqrt(5) #doctest: +SKIP + ___ + \\/ 5 + >>> init_session(pretty_print=False) #doctest: +SKIP + >>> sqrt(5) #doctest: +SKIP + sqrt(5) + >>> y + x + y**2 + x**2 #doctest: +SKIP + x**2 + x + y**2 + y + >>> init_session(order='grlex') #doctest: +SKIP + >>> y + x + y**2 + x**2 #doctest: +SKIP + x**2 + y**2 + x + y + >>> init_session(order='grevlex') #doctest: +SKIP + >>> y * x**2 + x * y**2 #doctest: +SKIP + x**2*y + x*y**2 + >>> init_session(order='old') #doctest: +SKIP + >>> x**2 + y**2 + x + y #doctest: +SKIP + x + y + x**2 + y**2 + >>> theta = Symbol('theta') #doctest: +SKIP + >>> theta #doctest: +SKIP + theta + >>> init_session(use_unicode=True) #doctest: +SKIP + >>> theta # doctest: +SKIP + \u03b8 + """ + import sys + + in_ipython = False + + if ipython is not False: + try: + import IPython + except ImportError: + if ipython is True: + raise RuntimeError("IPython is not available on this system") + ip = None + else: + try: + from IPython import get_ipython + ip = get_ipython() + except ImportError: + ip = None + in_ipython = bool(ip) + if ipython is None: + ipython = in_ipython + + if ipython is False: + ip = init_python_session() + mainloop = ip.interact + else: + ip = init_ipython_session(ip, argv=argv, auto_symbols=auto_symbols, + auto_int_to_Integer=auto_int_to_Integer) + + if version_tuple(IPython.__version__) >= version_tuple('0.11'): + # runsource is gone, use run_cell instead, which doesn't + # take a symbol arg. The second arg is `store_history`, + # and False means don't add the line to IPython's history. + ip.runsource = lambda src, symbol='exec': ip.run_cell(src, False) + + # Enable interactive plotting using pylab. + try: + ip.enable_pylab(import_all=False) + except Exception: + # Causes an import error if matplotlib is not installed. + # Causes other errors (depending on the backend) if there + # is no display, or if there is some problem in the + # backend, so we have a bare "except Exception" here + pass + if not in_ipython: + mainloop = ip.mainloop + + if auto_symbols and (not ipython or version_tuple(IPython.__version__) < version_tuple('0.11')): + raise RuntimeError("automatic construction of symbols is possible only in IPython 0.11 or above") + if auto_int_to_Integer and (not ipython or version_tuple(IPython.__version__) < version_tuple('0.11')): + raise RuntimeError("automatic int to Integer transformation is possible only in IPython 0.11 or above") + + _preexec_source = preexec_source + + ip.runsource(_preexec_source, symbol='exec') + init_printing(pretty_print=pretty_print, order=order, + use_unicode=use_unicode, use_latex=use_latex, ip=ip, + str_printer=str_printer, pretty_printer=pretty_printer, + latex_printer=latex_printer) + + message = _make_message(ipython, quiet, _preexec_source) + + if not in_ipython: + print(message) + mainloop() + sys.exit('Exiting ...') + else: + print(message) + import atexit + atexit.register(lambda: print("Exiting ...\n")) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_interactive.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_interactive.py new file mode 100644 index 0000000000000000000000000000000000000000..3e088c42fd872c13849e593b04734158f5d1e5bc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_interactive.py @@ -0,0 +1,10 @@ +from sympy.interactive.session import int_to_Integer + + +def test_int_to_Integer(): + assert int_to_Integer("1 + 2.2 + 0x3 + 40") == \ + 'Integer (1 )+2.2 +Integer (0x3 )+Integer (40 )' + assert int_to_Integer("0b101") == 'Integer (0b101 )' + assert int_to_Integer("ab1 + 1 + '1 + 2'") == "ab1 +Integer (1 )+'1 + 2'" + assert int_to_Integer("(2 + \n3)") == '(Integer (2 )+\nInteger (3 ))' + assert int_to_Integer("2 + 2.0 + 2j + 2e-10") == 'Integer (2 )+2.0 +2j +2e-10 ' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_ipython.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_ipython.py new file mode 100644 index 0000000000000000000000000000000000000000..ac4734406d2f1197732a9dcbdd94b2b34e9fe170 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/tests/test_ipython.py @@ -0,0 +1,278 @@ +"""Tests of tools for setting up interactive IPython sessions. """ + +from sympy.interactive.session import (init_ipython_session, + enable_automatic_symbols, enable_automatic_int_sympification) + +from sympy.core import Symbol, Rational, Integer +from sympy.external import import_module +from sympy.testing.pytest import raises + +# TODO: The code below could be made more granular with something like: +# +# @requires('IPython', version=">=1.0") +# def test_automatic_symbols(ipython): + +ipython = import_module("IPython", min_module_version="1.0") + +if not ipython: + #bin/test will not execute any tests now + disabled = True + +# WARNING: These tests will modify the existing IPython environment. IPython +# uses a single instance for its interpreter, so there is no way to isolate +# the test from another IPython session. It also means that if this test is +# run twice in the same Python session it will fail. This isn't usually a +# problem because the test suite is run in a subprocess by default, but if the +# tests are run with subprocess=False it can pollute the current IPython +# session. See the discussion in issue #15149. + +def test_automatic_symbols(): + # NOTE: Because of the way the hook works, you have to use run_cell(code, + # True). This means that the code must have no Out, or it will be printed + # during the tests. + app = init_ipython_session() + app.run_cell("from sympy import *") + + enable_automatic_symbols(app) + + symbol = "verylongsymbolname" + assert symbol not in app.user_ns + app.run_cell("a = %s" % symbol, True) + assert symbol not in app.user_ns + app.run_cell("a = type(%s)" % symbol, True) + assert app.user_ns['a'] == Symbol + app.run_cell("%s = Symbol('%s')" % (symbol, symbol), True) + assert symbol in app.user_ns + + # Check that built-in names aren't overridden + app.run_cell("a = all == __builtin__.all", True) + assert "all" not in app.user_ns + assert app.user_ns['a'] is True + + # Check that SymPy names aren't overridden + app.run_cell("import sympy") + app.run_cell("a = factorial == sympy.factorial", True) + assert app.user_ns['a'] is True + + +def test_int_to_Integer(): + # XXX: Warning, don't test with == here. 0.5 == Rational(1, 2) is True! + app = init_ipython_session() + app.run_cell("from sympy import Integer") + app.run_cell("a = 1") + assert isinstance(app.user_ns['a'], int) + + enable_automatic_int_sympification(app) + app.run_cell("a = 1/2") + assert isinstance(app.user_ns['a'], Rational) + app.run_cell("a = 1") + assert isinstance(app.user_ns['a'], Integer) + app.run_cell("a = int(1)") + assert isinstance(app.user_ns['a'], int) + app.run_cell("a = (1/\n2)") + assert app.user_ns['a'] == Rational(1, 2) + # TODO: How can we test that the output of a SyntaxError is the original + # input, not the transformed input? + + +def test_ipythonprinting(): + # Initialize and setup IPython session + app = init_ipython_session() + app.run_cell("ip = get_ipython()") + app.run_cell("inst = ip.instance()") + app.run_cell("format = inst.display_formatter.format") + app.run_cell("from sympy import Symbol") + + # Printing without printing extension + app.run_cell("a = format(Symbol('pi'))") + app.run_cell("a2 = format(Symbol('pi')**2)") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + assert app.user_ns['a']['text/plain'] == "pi" + assert app.user_ns['a2']['text/plain'] == "pi**2" + else: + assert app.user_ns['a'][0]['text/plain'] == "pi" + assert app.user_ns['a2'][0]['text/plain'] == "pi**2" + + # Load printing extension + app.run_cell("from sympy import init_printing") + app.run_cell("init_printing()") + # Printing with printing extension + app.run_cell("a = format(Symbol('pi'))") + app.run_cell("a2 = format(Symbol('pi')**2)") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + assert app.user_ns['a']['text/plain'] in ('\N{GREEK SMALL LETTER PI}', 'pi') + assert app.user_ns['a2']['text/plain'] in (' 2\n\N{GREEK SMALL LETTER PI} ', ' 2\npi ') + else: + assert app.user_ns['a'][0]['text/plain'] in ('\N{GREEK SMALL LETTER PI}', 'pi') + assert app.user_ns['a2'][0]['text/plain'] in (' 2\n\N{GREEK SMALL LETTER PI} ', ' 2\npi ') + + +def test_print_builtin_option(): + # Initialize and setup IPython session + app = init_ipython_session() + app.run_cell("ip = get_ipython()") + app.run_cell("inst = ip.instance()") + app.run_cell("format = inst.display_formatter.format") + app.run_cell("from sympy import Symbol") + app.run_cell("from sympy import init_printing") + + app.run_cell("a = format({Symbol('pi'): 3.14, Symbol('n_i'): 3})") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + text = app.user_ns['a']['text/plain'] + raises(KeyError, lambda: app.user_ns['a']['text/latex']) + else: + text = app.user_ns['a'][0]['text/plain'] + raises(KeyError, lambda: app.user_ns['a'][0]['text/latex']) + # XXX: How can we make this ignore the terminal width? This test fails if + # the terminal is too narrow. + assert text in ("{pi: 3.14, n_i: 3}", + '{n\N{LATIN SUBSCRIPT SMALL LETTER I}: 3, \N{GREEK SMALL LETTER PI}: 3.14}', + "{n_i: 3, pi: 3.14}", + '{\N{GREEK SMALL LETTER PI}: 3.14, n\N{LATIN SUBSCRIPT SMALL LETTER I}: 3}') + + # If we enable the default printing, then the dictionary's should render + # as a LaTeX version of the whole dict: ${\pi: 3.14, n_i: 3}$ + app.run_cell("inst.display_formatter.formatters['text/latex'].enabled = True") + app.run_cell("init_printing(use_latex=True)") + app.run_cell("a = format({Symbol('pi'): 3.14, Symbol('n_i'): 3})") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + text = app.user_ns['a']['text/plain'] + latex = app.user_ns['a']['text/latex'] + else: + text = app.user_ns['a'][0]['text/plain'] + latex = app.user_ns['a'][0]['text/latex'] + assert text in ("{pi: 3.14, n_i: 3}", + '{n\N{LATIN SUBSCRIPT SMALL LETTER I}: 3, \N{GREEK SMALL LETTER PI}: 3.14}', + "{n_i: 3, pi: 3.14}", + '{\N{GREEK SMALL LETTER PI}: 3.14, n\N{LATIN SUBSCRIPT SMALL LETTER I}: 3}') + assert latex == r'$\displaystyle \left\{ n_{i} : 3, \ \pi : 3.14\right\}$' + + # Objects with an _latex overload should also be handled by our tuple + # printer. + app.run_cell("""\ + class WithOverload: + def _latex(self, printer): + return r"\\LaTeX" + """) + app.run_cell("a = format((WithOverload(),))") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + latex = app.user_ns['a']['text/latex'] + else: + latex = app.user_ns['a'][0]['text/latex'] + assert latex == r'$\displaystyle \left( \LaTeX,\right)$' + + app.run_cell("inst.display_formatter.formatters['text/latex'].enabled = True") + app.run_cell("init_printing(use_latex=True, print_builtin=False)") + app.run_cell("a = format({Symbol('pi'): 3.14, Symbol('n_i'): 3})") + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + text = app.user_ns['a']['text/plain'] + raises(KeyError, lambda: app.user_ns['a']['text/latex']) + else: + text = app.user_ns['a'][0]['text/plain'] + raises(KeyError, lambda: app.user_ns['a'][0]['text/latex']) + # Note : In Python 3 we have one text type: str which holds Unicode data + # and two byte types bytes and bytearray. + # Python 3.3.3 + IPython 0.13.2 gives: '{n_i: 3, pi: 3.14}' + # Python 3.3.3 + IPython 1.1.0 gives: '{n_i: 3, pi: 3.14}' + assert text in ("{pi: 3.14, n_i: 3}", "{n_i: 3, pi: 3.14}") + + +def test_builtin_containers(): + # Initialize and setup IPython session + app = init_ipython_session() + app.run_cell("ip = get_ipython()") + app.run_cell("inst = ip.instance()") + app.run_cell("format = inst.display_formatter.format") + app.run_cell("inst.display_formatter.formatters['text/latex'].enabled = True") + app.run_cell("from sympy import init_printing, Matrix") + app.run_cell('init_printing(use_latex=True, use_unicode=False)') + + # Make sure containers that shouldn't pretty print don't. + app.run_cell('a = format((True, False))') + app.run_cell('import sys') + app.run_cell('b = format(sys.flags)') + app.run_cell('c = format((Matrix([1, 2]),))') + # Deal with API change starting at IPython 1.0 + if int(ipython.__version__.split(".")[0]) < 1: + assert app.user_ns['a']['text/plain'] == '(True, False)' + assert 'text/latex' not in app.user_ns['a'] + assert app.user_ns['b']['text/plain'][:10] == 'sys.flags(' + assert 'text/latex' not in app.user_ns['b'] + assert app.user_ns['c']['text/plain'] == \ +"""\ + [1] \n\ +([ ],) + [2] \ +""" + assert app.user_ns['c']['text/latex'] == '$\\displaystyle \\left( \\left[\\begin{matrix}1\\\\2\\end{matrix}\\right],\\right)$' + else: + assert app.user_ns['a'][0]['text/plain'] == '(True, False)' + assert 'text/latex' not in app.user_ns['a'][0] + assert app.user_ns['b'][0]['text/plain'][:10] == 'sys.flags(' + assert 'text/latex' not in app.user_ns['b'][0] + assert app.user_ns['c'][0]['text/plain'] == \ +"""\ + [1] \n\ +([ ],) + [2] \ +""" + assert app.user_ns['c'][0]['text/latex'] == '$\\displaystyle \\left( \\left[\\begin{matrix}1\\\\2\\end{matrix}\\right],\\right)$' + +def test_matplotlib_bad_latex(): + # Initialize and setup IPython session + app = init_ipython_session() + app.run_cell("import IPython") + app.run_cell("ip = get_ipython()") + app.run_cell("inst = ip.instance()") + app.run_cell("format = inst.display_formatter.format") + app.run_cell("from sympy import init_printing, Matrix") + app.run_cell("init_printing(use_latex='matplotlib')") + + # The png formatter is not enabled by default in this context + app.run_cell("inst.display_formatter.formatters['image/png'].enabled = True") + + # Make sure no warnings are raised by IPython + app.run_cell("import warnings") + # IPython.core.formatters.FormatterWarning was introduced in IPython 2.0 + if int(ipython.__version__.split(".")[0]) < 2: + app.run_cell("warnings.simplefilter('error')") + else: + app.run_cell("warnings.simplefilter('error', IPython.core.formatters.FormatterWarning)") + + # This should not raise an exception + app.run_cell("a = format(Matrix([1, 2, 3]))") + + # issue 9799 + app.run_cell("from sympy import Piecewise, Symbol, Eq") + app.run_cell("x = Symbol('x'); pw = format(Piecewise((1, Eq(x, 0)), (0, True)))") + + +def test_override_repr_latex(): + # Initialize and setup IPython session + app = init_ipython_session() + app.run_cell("import IPython") + app.run_cell("ip = get_ipython()") + app.run_cell("inst = ip.instance()") + app.run_cell("format = inst.display_formatter.format") + app.run_cell("inst.display_formatter.formatters['text/latex'].enabled = True") + app.run_cell("from sympy import init_printing") + app.run_cell("from sympy import Symbol") + app.run_cell("init_printing(use_latex=True)") + app.run_cell("""\ + class SymbolWithOverload(Symbol): + def _repr_latex_(self): + return r"Hello " + super()._repr_latex_() + " world" + """) + app.run_cell("a = format(SymbolWithOverload('s'))") + + if int(ipython.__version__.split(".")[0]) < 1: + latex = app.user_ns['a']['text/latex'] + else: + latex = app.user_ns['a'][0]['text/latex'] + assert latex == r'Hello $\displaystyle s$ world' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/traversal.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/traversal.py new file mode 100644 index 0000000000000000000000000000000000000000..1315ec4ef7868b666bb6b978b3d8b20442d100b0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/interactive/traversal.py @@ -0,0 +1,95 @@ +from sympy.core.basic import Basic +from sympy.printing import pprint + +import random + +def interactive_traversal(expr): + """Traverse a tree asking a user which branch to choose. """ + + RED, BRED = '\033[0;31m', '\033[1;31m' + GREEN, BGREEN = '\033[0;32m', '\033[1;32m' + YELLOW, BYELLOW = '\033[0;33m', '\033[1;33m' # noqa + BLUE, BBLUE = '\033[0;34m', '\033[1;34m' # noqa + MAGENTA, BMAGENTA = '\033[0;35m', '\033[1;35m'# noqa + CYAN, BCYAN = '\033[0;36m', '\033[1;36m' # noqa + END = '\033[0m' + + def cprint(*args): + print("".join(map(str, args)) + END) + + def _interactive_traversal(expr, stage): + if stage > 0: + print() + + cprint("Current expression (stage ", BYELLOW, stage, END, "):") + print(BCYAN) + pprint(expr) + print(END) + + if isinstance(expr, Basic): + if expr.is_Add: + args = expr.as_ordered_terms() + elif expr.is_Mul: + args = expr.as_ordered_factors() + else: + args = expr.args + elif hasattr(expr, "__iter__"): + args = list(expr) + else: + return expr + + n_args = len(args) + + if not n_args: + return expr + + for i, arg in enumerate(args): + cprint(GREEN, "[", BGREEN, i, GREEN, "] ", BLUE, type(arg), END) + pprint(arg) + print() + + if n_args == 1: + choices = '0' + else: + choices = '0-%d' % (n_args - 1) + + try: + choice = input("Your choice [%s,f,l,r,d,?]: " % choices) + except EOFError: + result = expr + print() + else: + if choice == '?': + cprint(RED, "%s - select subexpression with the given index" % + choices) + cprint(RED, "f - select the first subexpression") + cprint(RED, "l - select the last subexpression") + cprint(RED, "r - select a random subexpression") + cprint(RED, "d - done\n") + + result = _interactive_traversal(expr, stage) + elif choice in ('d', ''): + result = expr + elif choice == 'f': + result = _interactive_traversal(args[0], stage + 1) + elif choice == 'l': + result = _interactive_traversal(args[-1], stage + 1) + elif choice == 'r': + result = _interactive_traversal(random.choice(args), stage + 1) + else: + try: + choice = int(choice) + except ValueError: + cprint(BRED, + "Choice must be a number in %s range\n" % choices) + result = _interactive_traversal(expr, stage) + else: + if choice < 0 or choice >= n_args: + cprint(BRED, "Choice must be in %s range\n" % choices) + result = _interactive_traversal(expr, stage) + else: + result = _interactive_traversal(args[choice], stage + 1) + + return result + + return _interactive_traversal(expr, 0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..5447651645e3e2e92df3002822e87a773ade0df8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py @@ -0,0 +1,11 @@ +from .core import dispatch +from .dispatcher import (Dispatcher, halt_ordering, restart_ordering, + MDNotImplementedError) + +__version__ = '0.4.9' + +__all__ = [ + 'dispatch', + + 'Dispatcher', 'halt_ordering', 'restart_ordering', 'MDNotImplementedError', +] diff --git 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b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/conflict.py @@ -0,0 +1,68 @@ +from .utils import _toposort, groupby + +class AmbiguityWarning(Warning): + pass + + +def supercedes(a, b): + """ A is consistent and strictly more specific than B """ + return len(a) == len(b) and all(map(issubclass, a, b)) + + +def consistent(a, b): + """ It is possible for an argument list to satisfy both A and B """ + return (len(a) == len(b) and + all(issubclass(aa, bb) or issubclass(bb, aa) + for aa, bb in zip(a, b))) + + +def ambiguous(a, b): + """ A is consistent with B but neither is strictly more specific """ + return consistent(a, b) and not (supercedes(a, b) or supercedes(b, a)) + + +def ambiguities(signatures): + """ All signature pairs such that A is ambiguous with B """ + signatures = list(map(tuple, signatures)) + return {(a, b) for a in signatures for b in signatures + if hash(a) < hash(b) + and ambiguous(a, b) + and not any(supercedes(c, a) and supercedes(c, b) + for c in signatures)} + + +def super_signature(signatures): + """ A signature that would break ambiguities """ + n = len(signatures[0]) + assert all(len(s) == n for s in signatures) + + return [max([type.mro(sig[i]) for sig in signatures], key=len)[0] + for i in range(n)] + + +def edge(a, b, tie_breaker=hash): + """ A should be checked before B + + Tie broken by tie_breaker, defaults to ``hash`` + """ + if supercedes(a, b): + if supercedes(b, a): + return tie_breaker(a) > tie_breaker(b) + else: + return True + return False + + +def ordering(signatures): + """ A sane ordering of signatures to check, first to last + + Topoological sort of edges as given by ``edge`` and ``supercedes`` + """ + signatures = list(map(tuple, signatures)) + edges = [(a, b) for a in signatures for b in signatures if edge(a, b)] + edges = groupby(lambda x: x[0], edges) + for s in signatures: + if s not in edges: + edges[s] = [] + edges = {k: [b for a, b in v] for k, v in edges.items()} + return _toposort(edges) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/core.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/core.py new file mode 100644 index 0000000000000000000000000000000000000000..2856ff728c4eb97c5a59fffabddb4bf3c8b4baf2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/core.py @@ -0,0 +1,83 @@ +from __future__ import annotations +from typing import Any + +import inspect + +from .dispatcher import Dispatcher, MethodDispatcher, ambiguity_warn + +# XXX: This parameter to dispatch isn't documented and isn't used anywhere in +# sympy. Maybe it should just be removed. +global_namespace: dict[str, Any] = {} + + +def dispatch(*types, namespace=global_namespace, on_ambiguity=ambiguity_warn): + """ Dispatch function on the types of the inputs + + Supports dispatch on all non-keyword arguments. + + Collects implementations based on the function name. Ignores namespaces. + + If ambiguous type signatures occur a warning is raised when the function is + defined suggesting the additional method to break the ambiguity. + + Examples + -------- + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def f(x): + ... return x + 1 + + >>> @dispatch(float) + ... def f(x): # noqa: F811 + ... return x - 1 + + >>> f(3) + 4 + >>> f(3.0) + 2.0 + + Specify an isolated namespace with the namespace keyword argument + + >>> my_namespace = dict() + >>> @dispatch(int, namespace=my_namespace) + ... def foo(x): + ... return x + 1 + + Dispatch on instance methods within classes + + >>> class MyClass(object): + ... @dispatch(list) + ... def __init__(self, data): + ... self.data = data + ... @dispatch(int) + ... def __init__(self, datum): # noqa: F811 + ... self.data = [datum] + """ + types = tuple(types) + + def _(func): + name = func.__name__ + + if ismethod(func): + dispatcher = inspect.currentframe().f_back.f_locals.get( + name, + MethodDispatcher(name)) + else: + if name not in namespace: + namespace[name] = Dispatcher(name) + dispatcher = namespace[name] + + dispatcher.add(types, func, on_ambiguity=on_ambiguity) + return dispatcher + return _ + + +def ismethod(func): + """ Is func a method? + + Note that this has to work as the method is defined but before the class is + defined. At this stage methods look like functions. + """ + signature = inspect.signature(func) + return signature.parameters.get('self', None) is not None diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py new file mode 100644 index 0000000000000000000000000000000000000000..89471d678e1c330138a91ec6a41a324d29a037d7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py @@ -0,0 +1,413 @@ +from __future__ import annotations + +from warnings import warn +import inspect +from .conflict import ordering, ambiguities, super_signature, AmbiguityWarning +from .utils import expand_tuples +import itertools as itl + + +class MDNotImplementedError(NotImplementedError): + """ A NotImplementedError for multiple dispatch """ + + +### Functions for on_ambiguity + +def ambiguity_warn(dispatcher, ambiguities): + """ Raise warning when ambiguity is detected + + Parameters + ---------- + dispatcher : Dispatcher + The dispatcher on which the ambiguity was detected + ambiguities : set + Set of type signature pairs that are ambiguous within this dispatcher + + See Also: + Dispatcher.add + warning_text + """ + warn(warning_text(dispatcher.name, ambiguities), AmbiguityWarning) + + +class RaiseNotImplementedError: + """Raise ``NotImplementedError`` when called.""" + + def __init__(self, dispatcher): + self.dispatcher = dispatcher + + def __call__(self, *args, **kwargs): + types = tuple(type(a) for a in args) + raise NotImplementedError( + "Ambiguous signature for %s: <%s>" % ( + self.dispatcher.name, str_signature(types) + )) + +def ambiguity_register_error_ignore_dup(dispatcher, ambiguities): + """ + If super signature for ambiguous types is duplicate types, ignore it. + Else, register instance of ``RaiseNotImplementedError`` for ambiguous types. + + Parameters + ---------- + dispatcher : Dispatcher + The dispatcher on which the ambiguity was detected + ambiguities : set + Set of type signature pairs that are ambiguous within this dispatcher + + See Also: + Dispatcher.add + ambiguity_warn + """ + for amb in ambiguities: + signature = tuple(super_signature(amb)) + if len(set(signature)) == 1: + continue + dispatcher.add( + signature, RaiseNotImplementedError(dispatcher), + on_ambiguity=ambiguity_register_error_ignore_dup + ) + +### + + +_unresolved_dispatchers: set[Dispatcher] = set() +_resolve = [True] + + +def halt_ordering(): + _resolve[0] = False + + +def restart_ordering(on_ambiguity=ambiguity_warn): + _resolve[0] = True + while _unresolved_dispatchers: + dispatcher = _unresolved_dispatchers.pop() + dispatcher.reorder(on_ambiguity=on_ambiguity) + + +class Dispatcher: + """ Dispatch methods based on type signature + + Use ``dispatch`` to add implementations + + Examples + -------- + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def f(x): + ... return x + 1 + + >>> @dispatch(float) + ... def f(x): # noqa: F811 + ... return x - 1 + + >>> f(3) + 4 + >>> f(3.0) + 2.0 + """ + __slots__ = '__name__', 'name', 'funcs', 'ordering', '_cache', 'doc' + + def __init__(self, name, doc=None): + self.name = self.__name__ = name + self.funcs = {} + self._cache = {} + self.ordering = [] + self.doc = doc + + def register(self, *types, **kwargs): + """ Register dispatcher with new implementation + + >>> from sympy.multipledispatch.dispatcher import Dispatcher + >>> f = Dispatcher('f') + >>> @f.register(int) + ... def inc(x): + ... return x + 1 + + >>> @f.register(float) + ... def dec(x): + ... return x - 1 + + >>> @f.register(list) + ... @f.register(tuple) + ... def reverse(x): + ... return x[::-1] + + >>> f(1) + 2 + + >>> f(1.0) + 0.0 + + >>> f([1, 2, 3]) + [3, 2, 1] + """ + def _(func): + self.add(types, func, **kwargs) + return func + return _ + + @classmethod + def get_func_params(cls, func): + if hasattr(inspect, "signature"): + sig = inspect.signature(func) + return sig.parameters.values() + + @classmethod + def get_func_annotations(cls, func): + """ Get annotations of function positional parameters + """ + params = cls.get_func_params(func) + if params: + Parameter = inspect.Parameter + + params = (param for param in params + if param.kind in + (Parameter.POSITIONAL_ONLY, + Parameter.POSITIONAL_OR_KEYWORD)) + + annotations = tuple( + param.annotation + for param in params) + + if not any(ann is Parameter.empty for ann in annotations): + return annotations + + def add(self, signature, func, on_ambiguity=ambiguity_warn): + """ Add new types/method pair to dispatcher + + >>> from sympy.multipledispatch import Dispatcher + >>> D = Dispatcher('add') + >>> D.add((int, int), lambda x, y: x + y) + >>> D.add((float, float), lambda x, y: x + y) + + >>> D(1, 2) + 3 + >>> D(1, 2.0) + Traceback (most recent call last): + ... + NotImplementedError: Could not find signature for add: + + When ``add`` detects a warning it calls the ``on_ambiguity`` callback + with a dispatcher/itself, and a set of ambiguous type signature pairs + as inputs. See ``ambiguity_warn`` for an example. + """ + # Handle annotations + if not signature: + annotations = self.get_func_annotations(func) + if annotations: + signature = annotations + + # Handle union types + if any(isinstance(typ, tuple) for typ in signature): + for typs in expand_tuples(signature): + self.add(typs, func, on_ambiguity) + return + + for typ in signature: + if not isinstance(typ, type): + str_sig = ', '.join(c.__name__ if isinstance(c, type) + else str(c) for c in signature) + raise TypeError("Tried to dispatch on non-type: %s\n" + "In signature: <%s>\n" + "In function: %s" % + (typ, str_sig, self.name)) + + self.funcs[signature] = func + self.reorder(on_ambiguity=on_ambiguity) + self._cache.clear() + + def reorder(self, on_ambiguity=ambiguity_warn): + if _resolve[0]: + self.ordering = ordering(self.funcs) + amb = ambiguities(self.funcs) + if amb: + on_ambiguity(self, amb) + else: + _unresolved_dispatchers.add(self) + + def __call__(self, *args, **kwargs): + types = tuple([type(arg) for arg in args]) + try: + func = self._cache[types] + except KeyError: + func = self.dispatch(*types) + if not func: + raise NotImplementedError( + 'Could not find signature for %s: <%s>' % + (self.name, str_signature(types))) + self._cache[types] = func + try: + return func(*args, **kwargs) + + except MDNotImplementedError: + funcs = self.dispatch_iter(*types) + next(funcs) # burn first + for func in funcs: + try: + return func(*args, **kwargs) + except MDNotImplementedError: + pass + raise NotImplementedError("Matching functions for " + "%s: <%s> found, but none completed successfully" + % (self.name, str_signature(types))) + + def __str__(self): + return "" % self.name + __repr__ = __str__ + + def dispatch(self, *types): + """ Deterimine appropriate implementation for this type signature + + This method is internal. Users should call this object as a function. + Implementation resolution occurs within the ``__call__`` method. + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def inc(x): + ... return x + 1 + + >>> implementation = inc.dispatch(int) + >>> implementation(3) + 4 + + >>> print(inc.dispatch(float)) + None + + See Also: + ``sympy.multipledispatch.conflict`` - module to determine resolution order + """ + + if types in self.funcs: + return self.funcs[types] + + try: + return next(self.dispatch_iter(*types)) + except StopIteration: + return None + + def dispatch_iter(self, *types): + n = len(types) + for signature in self.ordering: + if len(signature) == n and all(map(issubclass, types, signature)): + result = self.funcs[signature] + yield result + + def resolve(self, types): + """ Deterimine appropriate implementation for this type signature + + .. deprecated:: 0.4.4 + Use ``dispatch(*types)`` instead + """ + warn("resolve() is deprecated, use dispatch(*types)", + DeprecationWarning) + + return self.dispatch(*types) + + def __getstate__(self): + return {'name': self.name, + 'funcs': self.funcs} + + def __setstate__(self, d): + self.name = d['name'] + self.funcs = d['funcs'] + self.ordering = ordering(self.funcs) + self._cache = {} + + @property + def __doc__(self): + docs = ["Multiply dispatched method: %s" % self.name] + + if self.doc: + docs.append(self.doc) + + other = [] + for sig in self.ordering[::-1]: + func = self.funcs[sig] + if func.__doc__: + s = 'Inputs: <%s>\n' % str_signature(sig) + s += '-' * len(s) + '\n' + s += func.__doc__.strip() + docs.append(s) + else: + other.append(str_signature(sig)) + + if other: + docs.append('Other signatures:\n ' + '\n '.join(other)) + + return '\n\n'.join(docs) + + def _help(self, *args): + return self.dispatch(*map(type, args)).__doc__ + + def help(self, *args, **kwargs): + """ Print docstring for the function corresponding to inputs """ + print(self._help(*args)) + + def _source(self, *args): + func = self.dispatch(*map(type, args)) + if not func: + raise TypeError("No function found") + return source(func) + + def source(self, *args, **kwargs): + """ Print source code for the function corresponding to inputs """ + print(self._source(*args)) + + +def source(func): + s = 'File: %s\n\n' % inspect.getsourcefile(func) + s = s + inspect.getsource(func) + return s + + +class MethodDispatcher(Dispatcher): + """ Dispatch methods based on type signature + + See Also: + Dispatcher + """ + + @classmethod + def get_func_params(cls, func): + if hasattr(inspect, "signature"): + sig = inspect.signature(func) + return itl.islice(sig.parameters.values(), 1, None) + + def __get__(self, instance, owner): + self.obj = instance + self.cls = owner + return self + + def __call__(self, *args, **kwargs): + types = tuple([type(arg) for arg in args]) + func = self.dispatch(*types) + if not func: + raise NotImplementedError('Could not find signature for %s: <%s>' % + (self.name, str_signature(types))) + return func(self.obj, *args, **kwargs) + + +def str_signature(sig): + """ String representation of type signature + + >>> from sympy.multipledispatch.dispatcher import str_signature + >>> str_signature((int, float)) + 'int, float' + """ + return ', '.join(cls.__name__ for cls in sig) + + +def warning_text(name, amb): + """ The text for ambiguity warnings """ + text = "\nAmbiguities exist in dispatched function %s\n\n" % (name) + text += "The following signatures may result in ambiguous behavior:\n" + for pair in amb: + text += "\t" + \ + ', '.join('[' + str_signature(s) + ']' for s in pair) + "\n" + text += "\n\nConsider making the following additions:\n\n" + text += '\n\n'.join(['@dispatch(' + str_signature(super_signature(s)) + + ')\ndef %s(...)' % name for s in amb]) + return text diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py new file mode 100644 index 0000000000000000000000000000000000000000..5d2292c460585ae2a65a01795b38499e67706ff0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py @@ -0,0 +1,62 @@ +from sympy.multipledispatch.conflict import (supercedes, ordering, ambiguities, + ambiguous, super_signature, consistent) + + +class A: pass +class B(A): pass +class C: pass + + +def test_supercedes(): + assert supercedes([B], [A]) + assert supercedes([B, A], [A, A]) + assert not supercedes([B, A], [A, B]) + assert not supercedes([A], [B]) + + +def test_consistent(): + assert consistent([A], [A]) + assert consistent([B], [B]) + assert not consistent([A], [C]) + assert consistent([A, B], [A, B]) + assert consistent([B, A], [A, B]) + assert not consistent([B, A], [B]) + assert not consistent([B, A], [B, C]) + + +def test_super_signature(): + assert super_signature([[A]]) == [A] + assert super_signature([[A], [B]]) == [B] + assert super_signature([[A, B], [B, A]]) == [B, B] + assert super_signature([[A, A, B], [A, B, A], [B, A, A]]) == [B, B, B] + + +def test_ambiguous(): + assert not ambiguous([A], [A]) + assert not ambiguous([A], [B]) + assert not ambiguous([B], [B]) + assert not ambiguous([A, B], [B, B]) + assert ambiguous([A, B], [B, A]) + + +def test_ambiguities(): + signatures = [[A], [B], [A, B], [B, A], [A, C]] + expected = {((A, B), (B, A))} + result = ambiguities(signatures) + assert set(map(frozenset, expected)) == set(map(frozenset, result)) + + signatures = [[A], [B], [A, B], [B, A], [A, C], [B, B]] + expected = set() + result = ambiguities(signatures) + assert set(map(frozenset, expected)) == set(map(frozenset, result)) + + +def test_ordering(): + signatures = [[A, A], [A, B], [B, A], [B, B], [A, C]] + ord = ordering(signatures) + assert ord[0] == (B, B) or ord[0] == (A, C) + assert ord[-1] == (A, A) or ord[-1] == (A, C) + + +def test_type_mro(): + assert super_signature([[object], [type]]) == [type] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py new file mode 100644 index 0000000000000000000000000000000000000000..016270fecc8cda644fc71b5c310b1430b50361f6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py @@ -0,0 +1,213 @@ +from __future__ import annotations +from typing import Any + +from sympy.multipledispatch import dispatch +from sympy.multipledispatch.conflict import AmbiguityWarning +from sympy.testing.pytest import raises, warns +from functools import partial + +test_namespace: dict[str, Any] = {} + +orig_dispatch = dispatch +dispatch = partial(dispatch, namespace=test_namespace) + + +def test_singledispatch(): + @dispatch(int) + def f(x): # noqa:F811 + return x + 1 + + @dispatch(int) + def g(x): # noqa:F811 + return x + 2 + + @dispatch(float) # noqa:F811 + def f(x): # noqa:F811 + return x - 1 + + assert f(1) == 2 + assert g(1) == 3 + assert f(1.0) == 0 + + assert raises(NotImplementedError, lambda: f('hello')) + + +def test_multipledispatch(): + @dispatch(int, int) + def f(x, y): # noqa:F811 + return x + y + + @dispatch(float, float) # noqa:F811 + def f(x, y): # noqa:F811 + return x - y + + assert f(1, 2) == 3 + assert f(1.0, 2.0) == -1.0 + + +class A: pass +class B: pass +class C(A): pass +class D(C): pass +class E(C): pass + + +def test_inheritance(): + @dispatch(A) + def f(x): # noqa:F811 + return 'a' + + @dispatch(B) # noqa:F811 + def f(x): # noqa:F811 + return 'b' + + assert f(A()) == 'a' + assert f(B()) == 'b' + assert f(C()) == 'a' + + +def test_inheritance_and_multiple_dispatch(): + @dispatch(A, A) + def f(x, y): # noqa:F811 + return type(x), type(y) + + @dispatch(A, B) # noqa:F811 + def f(x, y): # noqa:F811 + return 0 + + assert f(A(), A()) == (A, A) + assert f(A(), C()) == (A, C) + assert f(A(), B()) == 0 + assert f(C(), B()) == 0 + assert raises(NotImplementedError, lambda: f(B(), B())) + + +def test_competing_solutions(): + @dispatch(A) + def h(x): # noqa:F811 + return 1 + + @dispatch(C) # noqa:F811 + def h(x): # noqa:F811 + return 2 + + assert h(D()) == 2 + + +def test_competing_multiple(): + @dispatch(A, B) + def h(x, y): # noqa:F811 + return 1 + + @dispatch(C, B) # noqa:F811 + def h(x, y): # noqa:F811 + return 2 + + assert h(D(), B()) == 2 + + +def test_competing_ambiguous(): + test_namespace = {} + dispatch = partial(orig_dispatch, namespace=test_namespace) + + @dispatch(A, C) + def f(x, y): # noqa:F811 + return 2 + + with warns(AmbiguityWarning, test_stacklevel=False): + @dispatch(C, A) # noqa:F811 + def f(x, y): # noqa:F811 + return 2 + + assert f(A(), C()) == f(C(), A()) == 2 + # assert raises(Warning, lambda : f(C(), C())) + + +def test_caching_correct_behavior(): + @dispatch(A) + def f(x): # noqa:F811 + return 1 + + assert f(C()) == 1 + + @dispatch(C) + def f(x): # noqa:F811 + return 2 + + assert f(C()) == 2 + + +def test_union_types(): + @dispatch((A, C)) + def f(x): # noqa:F811 + return 1 + + assert f(A()) == 1 + assert f(C()) == 1 + + +def test_namespaces(): + ns1 = {} + ns2 = {} + + def foo(x): + return 1 + foo1 = orig_dispatch(int, namespace=ns1)(foo) + + def foo(x): + return 2 + foo2 = orig_dispatch(int, namespace=ns2)(foo) + + assert foo1(0) == 1 + assert foo2(0) == 2 + + +""" +Fails +def test_dispatch_on_dispatch(): + @dispatch(A) + @dispatch(C) + def q(x): # noqa:F811 + return 1 + + assert q(A()) == 1 + assert q(C()) == 1 +""" + + +def test_methods(): + class Foo: + @dispatch(float) + def f(self, x): # noqa:F811 + return x - 1 + + @dispatch(int) # noqa:F811 + def f(self, x): # noqa:F811 + return x + 1 + + @dispatch(int) + def g(self, x): # noqa:F811 + return x + 3 + + + foo = Foo() + assert foo.f(1) == 2 + assert foo.f(1.0) == 0.0 + assert foo.g(1) == 4 + + +def test_methods_multiple_dispatch(): + class Foo: + @dispatch(A, A) + def f(x, y): # noqa:F811 + return 1 + + @dispatch(A, C) # noqa:F811 + def f(x, y): # noqa:F811 + return 2 + + + foo = Foo() + assert foo.f(A(), A()) == 1 + assert foo.f(A(), C()) == 2 + assert foo.f(C(), C()) == 2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py new file mode 100644 index 0000000000000000000000000000000000000000..e31ca8a5486b87eb43fc5e6f887caf50d6bfbe20 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py @@ -0,0 +1,284 @@ +from sympy.multipledispatch.dispatcher import (Dispatcher, MDNotImplementedError, + MethodDispatcher, halt_ordering, + restart_ordering, + ambiguity_register_error_ignore_dup) +from sympy.testing.pytest import raises, warns + + +def identity(x): + return x + + +def inc(x): + return x + 1 + + +def dec(x): + return x - 1 + + +def test_dispatcher(): + f = Dispatcher('f') + f.add((int,), inc) + f.add((float,), dec) + + with warns(DeprecationWarning, test_stacklevel=False): + assert f.resolve((int,)) == inc + assert f.dispatch(int) is inc + + assert f(1) == 2 + assert f(1.0) == 0.0 + + +def test_union_types(): + f = Dispatcher('f') + f.register((int, float))(inc) + + assert f(1) == 2 + assert f(1.0) == 2.0 + + +def test_dispatcher_as_decorator(): + f = Dispatcher('f') + + @f.register(int) + def inc(x): # noqa:F811 + return x + 1 + + @f.register(float) # noqa:F811 + def inc(x): # noqa:F811 + return x - 1 + + assert f(1) == 2 + assert f(1.0) == 0.0 + + +def test_register_instance_method(): + + class Test: + __init__ = MethodDispatcher('f') + + @__init__.register(list) + def _init_list(self, data): + self.data = data + + @__init__.register(object) + def _init_obj(self, datum): + self.data = [datum] + + a = Test(3) + b = Test([3]) + assert a.data == b.data + + +def test_on_ambiguity(): + f = Dispatcher('f') + + def identity(x): return x + + ambiguities = [False] + + def on_ambiguity(dispatcher, amb): + ambiguities[0] = True + + f.add((object, object), identity, on_ambiguity=on_ambiguity) + assert not ambiguities[0] + f.add((object, float), identity, on_ambiguity=on_ambiguity) + assert not ambiguities[0] + f.add((float, object), identity, on_ambiguity=on_ambiguity) + assert ambiguities[0] + + +def test_raise_error_on_non_class(): + f = Dispatcher('f') + assert raises(TypeError, lambda: f.add((1,), inc)) + + +def test_docstring(): + + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x + y + + def three(x, y): + return x + y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((object, object), one) + f.add((int, int), two) + f.add((float, float), three) + + assert one.__doc__.strip() in f.__doc__ + assert two.__doc__.strip() in f.__doc__ + assert f.__doc__.find(one.__doc__.strip()) < \ + f.__doc__.find(two.__doc__.strip()) + assert 'object, object' in f.__doc__ + assert master_doc in f.__doc__ + + +def test_help(): + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x + y + + def three(x, y): + """ Docstring number three """ + return x + y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((object, object), one) + f.add((int, int), two) + f.add((float, float), three) + + assert f._help(1, 1) == two.__doc__ + assert f._help(1.0, 2.0) == three.__doc__ + + +def test_source(): + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x - y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((int, int), one) + f.add((float, float), two) + + assert 'x + y' in f._source(1, 1) + assert 'x - y' in f._source(1.0, 1.0) + + +def test_source_raises_on_missing_function(): + f = Dispatcher('f') + + assert raises(TypeError, lambda: f.source(1)) + + +def test_halt_method_resolution(): + g = [0] + + def on_ambiguity(a, b): + g[0] += 1 + + f = Dispatcher('f') + + halt_ordering() + + def func(*args): + pass + + f.add((int, object), func) + f.add((object, int), func) + + assert g == [0] + + restart_ordering(on_ambiguity=on_ambiguity) + + assert g == [1] + + assert set(f.ordering) == {(int, object), (object, int)} + + +def test_no_implementations(): + f = Dispatcher('f') + assert raises(NotImplementedError, lambda: f('hello')) + + +def test_register_stacking(): + f = Dispatcher('f') + + @f.register(list) + @f.register(tuple) + def rev(x): + return x[::-1] + + assert f((1, 2, 3)) == (3, 2, 1) + assert f([1, 2, 3]) == [3, 2, 1] + + assert raises(NotImplementedError, lambda: f('hello')) + assert rev('hello') == 'olleh' + + +def test_dispatch_method(): + f = Dispatcher('f') + + @f.register(list) + def rev(x): + return x[::-1] + + @f.register(int, int) + def add(x, y): + return x + y + + class MyList(list): + pass + + assert f.dispatch(list) is rev + assert f.dispatch(MyList) is rev + assert f.dispatch(int, int) is add + + +def test_not_implemented(): + f = Dispatcher('f') + + @f.register(object) + def _(x): + return 'default' + + @f.register(int) + def _(x): + if x % 2 == 0: + return 'even' + else: + raise MDNotImplementedError() + + assert f('hello') == 'default' # default behavior + assert f(2) == 'even' # specialized behavior + assert f(3) == 'default' # fall bac to default behavior + assert raises(NotImplementedError, lambda: f(1, 2)) + + +def test_not_implemented_error(): + f = Dispatcher('f') + + @f.register(float) + def _(a): + raise MDNotImplementedError() + + assert raises(NotImplementedError, lambda: f(1.0)) + +def test_ambiguity_register_error_ignore_dup(): + f = Dispatcher('f') + + class A: + pass + class B(A): + pass + class C(A): + pass + + # suppress warning for registering ambiguous signal + f.add((A, B), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((B, A), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((A, C), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((C, A), lambda x,y: None, ambiguity_register_error_ignore_dup) + + # raises error if ambiguous signal is passed + assert raises(NotImplementedError, lambda: f(B(), C())) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/utils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/utils.py new file mode 100644 index 0000000000000000000000000000000000000000..11f563772385124c2fc0d285f7aa6e0747b8b412 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/multipledispatch/utils.py @@ -0,0 +1,105 @@ +from collections import OrderedDict + + +def expand_tuples(L): + """ + >>> from sympy.multipledispatch.utils import expand_tuples + >>> expand_tuples([1, (2, 3)]) + [(1, 2), (1, 3)] + + >>> expand_tuples([1, 2]) + [(1, 2)] + """ + if not L: + return [()] + elif not isinstance(L[0], tuple): + rest = expand_tuples(L[1:]) + return [(L[0],) + t for t in rest] + else: + rest = expand_tuples(L[1:]) + return [(item,) + t for t in rest for item in L[0]] + + +# Taken from theano/theano/gof/sched.py +# Avoids licensing issues because this was written by Matthew Rocklin +def _toposort(edges): + """ Topological sort algorithm by Kahn [1] - O(nodes + vertices) + + inputs: + edges - a dict of the form {a: {b, c}} where b and c depend on a + outputs: + L - an ordered list of nodes that satisfy the dependencies of edges + + >>> from sympy.multipledispatch.utils import _toposort + >>> _toposort({1: (2, 3), 2: (3, )}) + [1, 2, 3] + + Closely follows the wikipedia page [2] + + [1] Kahn, Arthur B. (1962), "Topological sorting of large networks", + Communications of the ACM + [2] https://en.wikipedia.org/wiki/Toposort#Algorithms + """ + incoming_edges = reverse_dict(edges) + incoming_edges = {k: set(val) for k, val in incoming_edges.items()} + S = OrderedDict.fromkeys(v for v in edges if v not in incoming_edges) + L = [] + + while S: + n, _ = S.popitem() + L.append(n) + for m in edges.get(n, ()): + assert n in incoming_edges[m] + incoming_edges[m].remove(n) + if not incoming_edges[m]: + S[m] = None + if any(incoming_edges.get(v, None) for v in edges): + raise ValueError("Input has cycles") + return L + + +def reverse_dict(d): + """Reverses direction of dependence dict + + >>> d = {'a': (1, 2), 'b': (2, 3), 'c':()} + >>> reverse_dict(d) # doctest: +SKIP + {1: ('a',), 2: ('a', 'b'), 3: ('b',)} + + :note: dict order are not deterministic. As we iterate on the + input dict, it make the output of this function depend on the + dict order. So this function output order should be considered + as undeterministic. + + """ + result = {} + for key in d: + for val in d[key]: + result[val] = result.get(val, ()) + (key, ) + return result + + +# Taken from toolz +# Avoids licensing issues because this version was authored by Matthew Rocklin +def groupby(func, seq): + """ Group a collection by a key function + + >>> from sympy.multipledispatch.utils import groupby + >>> names = ['Alice', 'Bob', 'Charlie', 'Dan', 'Edith', 'Frank'] + >>> groupby(len, names) # doctest: +SKIP + {3: ['Bob', 'Dan'], 5: ['Alice', 'Edith', 'Frank'], 7: ['Charlie']} + + >>> iseven = lambda x: x % 2 == 0 + >>> groupby(iseven, [1, 2, 3, 4, 5, 6, 7, 8]) # doctest: +SKIP + {False: [1, 3, 5, 7], True: [2, 4, 6, 8]} + + See Also: + ``countby`` + """ + + d = {} + for item in seq: + key = func(item) + if key not in d: + d[key] = [] + d[key].append(item) + return d diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..b39d031bca26bc599eb9eb0e12dfe48f7e6db174 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__init__.py @@ -0,0 +1,4 @@ +"""Used for translating a string into a SymPy expression. """ +__all__ = ['parse_expr'] + +from .sympy_parser import parse_expr diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..91c61386a52aac3a9944a28a0af1c631fd0d75f8 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/sympy_parser.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/sympy_parser.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..f979ea32c15a3e8e12834584209d5aed12132609 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/__pycache__/sympy_parser.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/ast_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/ast_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..95a773d5bec6e130810b7b7925fdff57270aec17 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/ast_parser.py @@ -0,0 +1,79 @@ +""" +This module implements the functionality to take any Python expression as a +string and fix all numbers and other things before evaluating it, +thus + +1/2 + +returns + +Integer(1)/Integer(2) + +We use the ast module for this. It is well documented at docs.python.org. + +Some tips to understand how this works: use dump() to get a nice +representation of any node. Then write a string of what you want to get, +e.g. "Integer(1)", parse it, dump it and you'll see that you need to do +"Call(Name('Integer', Load()), [node], [], None, None)". You do not need +to bother with lineno and col_offset, just call fix_missing_locations() +before returning the node. +""" + +from sympy.core.basic import Basic +from sympy.core.sympify import SympifyError + +from ast import parse, NodeTransformer, Call, Name, Load, \ + fix_missing_locations, Constant, Tuple + +class Transform(NodeTransformer): + + def __init__(self, local_dict, global_dict): + NodeTransformer.__init__(self) + self.local_dict = local_dict + self.global_dict = global_dict + + def visit_Constant(self, node): + if isinstance(node.value, int): + return fix_missing_locations(Call(func=Name('Integer', Load()), + args=[node], keywords=[])) + elif isinstance(node.value, float): + return fix_missing_locations(Call(func=Name('Float', Load()), + args=[node], keywords=[])) + return node + + def visit_Name(self, node): + if node.id in self.local_dict: + return node + elif node.id in self.global_dict: + name_obj = self.global_dict[node.id] + + if isinstance(name_obj, (Basic, type)) or callable(name_obj): + return node + elif node.id in ['True', 'False']: + return node + return fix_missing_locations(Call(func=Name('Symbol', Load()), + args=[Constant(node.id)], keywords=[])) + + def visit_Lambda(self, node): + args = [self.visit(arg) for arg in node.args.args] + body = self.visit(node.body) + n = Call(func=Name('Lambda', Load()), + args=[Tuple(args, Load()), body], keywords=[]) + return fix_missing_locations(n) + +def parse_expr(s, local_dict): + """ + Converts the string "s" to a SymPy expression, in local_dict. + + It converts all numbers to Integers before feeding it to Python and + automatically creates Symbols. + """ + global_dict = {} + exec('from sympy import *', global_dict) + try: + a = parse(s.strip(), mode="eval") + except SyntaxError: + raise SympifyError("Cannot parse %s." % repr(s)) + a = Transform(local_dict, global_dict).visit(a) + e = compile(a, "", "eval") + return eval(e, global_dict, local_dict) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 new file mode 100644 index 0000000000000000000000000000000000000000..94feea5fa4f49e9d1054eca2cd60c996aebff7c2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 @@ -0,0 +1,118 @@ +grammar Autolev; + +options { + language = Python3; +} + +prog: stat+; + +stat: varDecl + | functionCall + | codeCommands + | massDecl + | inertiaDecl + | assignment + | settings + ; + +assignment: vec equals expr #vecAssign + | ID '[' index ']' equals expr #indexAssign + | ID diff? equals expr #regularAssign; + +equals: ('='|'+='|'-='|':='|'*='|'/='|'^='); + +index: expr (',' expr)* ; + +diff: ('\'')+; + +functionCall: ID '(' (expr (',' expr)*)? ')' + | (Mass|Inertia) '(' (ID (',' ID)*)? ')'; + +varDecl: varType varDecl2 (',' varDecl2)*; + +varType: Newtonian|Frames|Bodies|Particles|Points|Constants + | Specifieds|Imaginary|Variables ('\'')*|MotionVariables ('\'')*; + +varDecl2: ID ('{' INT ',' INT '}')? (('{' INT ':' INT (',' INT ':' INT)* '}'))? ('{' INT '}')? ('+'|'-')? ('\'')* ('=' expr)?; + +ranges: ('{' INT ':' INT (',' INT ':' INT)* '}'); + +massDecl: Mass massDecl2 (',' massDecl2)*; + +massDecl2: ID '=' expr; + +inertiaDecl: Inertia ID ('(' ID ')')? (',' expr)+; + +matrix: '[' expr ((','|';') expr)* ']'; +matrixInOutput: (ID (ID '=' (FLOAT|INT)?))|FLOAT|INT; + +codeCommands: units + | inputs + | outputs + | codegen + | commands; + +settings: ID (EXP|ID|FLOAT|INT)?; + +units: UnitSystem ID (',' ID)*; +inputs: Input inputs2 (',' inputs2)*; +id_diff: ID diff?; +inputs2: id_diff '=' expr expr?; +outputs: Output outputs2 (',' outputs2)*; +outputs2: expr expr?; +codegen: ID functionCall ('['matrixInOutput (',' matrixInOutput)*']')? ID'.'ID; + +commands: Save ID'.'ID + | Encode ID (',' ID)*; + +vec: ID ('>')+ + | '0>' + | '1>>'; + +expr: expr '^' expr # Exponent + | expr ('*'|'/') expr # MulDiv + | expr ('+'|'-') expr # AddSub + | EXP # exp + | '-' expr # negativeOne + | FLOAT # float + | INT # int + | ID('\'')* # id + | vec # VectorOrDyadic + | ID '['expr (',' expr)* ']' # Indexing + | functionCall # function + | matrix # matrices + | '(' expr ')' # parens + | expr '=' expr # idEqualsExpr + | expr ':' expr # colon + | ID? ranges ('\'')* # rangess + ; + +// These are to take care of the case insensitivity of Autolev. +Mass: ('M'|'m')('A'|'a')('S'|'s')('S'|'s'); +Inertia: ('I'|'i')('N'|'n')('E'|'e')('R'|'r')('T'|'t')('I'|'i')('A'|'a'); +Input: ('I'|'i')('N'|'n')('P'|'p')('U'|'u')('T'|'t')('S'|'s')?; +Output: ('O'|'o')('U'|'u')('T'|'t')('P'|'p')('U'|'u')('T'|'t'); +Save: ('S'|'s')('A'|'a')('V'|'v')('E'|'e'); +UnitSystem: ('U'|'u')('N'|'n')('I'|'i')('T'|'t')('S'|'s')('Y'|'y')('S'|'s')('T'|'t')('E'|'e')('M'|'m'); +Encode: ('E'|'e')('N'|'n')('C'|'c')('O'|'o')('D'|'d')('E'|'e'); +Newtonian: ('N'|'n')('E'|'e')('W'|'w')('T'|'t')('O'|'o')('N'|'n')('I'|'i')('A'|'a')('N'|'n'); +Frames: ('F'|'f')('R'|'r')('A'|'a')('M'|'m')('E'|'e')('S'|'s')?; +Bodies: ('B'|'b')('O'|'o')('D'|'d')('I'|'i')('E'|'e')('S'|'s')?; +Particles: ('P'|'p')('A'|'a')('R'|'r')('T'|'t')('I'|'i')('C'|'c')('L'|'l')('E'|'e')('S'|'s')?; +Points: ('P'|'p')('O'|'o')('I'|'i')('N'|'n')('T'|'t')('S'|'s')?; +Constants: ('C'|'c')('O'|'o')('N'|'n')('S'|'s')('T'|'t')('A'|'a')('N'|'n')('T'|'t')('S'|'s')?; +Specifieds: ('S'|'s')('P'|'p')('E'|'e')('C'|'c')('I'|'i')('F'|'f')('I'|'i')('E'|'e')('D'|'d')('S'|'s')?; +Imaginary: ('I'|'i')('M'|'m')('A'|'a')('G'|'g')('I'|'i')('N'|'n')('A'|'a')('R'|'r')('Y'|'y'); +Variables: ('V'|'v')('A'|'a')('R'|'r')('I'|'i')('A'|'a')('B'|'b')('L'|'l')('E'|'e')('S'|'s')?; +MotionVariables: ('M'|'m')('O'|'o')('T'|'t')('I'|'i')('O'|'o')('N'|'n')('V'|'v')('A'|'a')('R'|'r')('I'|'i')('A'|'a')('B'|'b')('L'|'l')('E'|'e')('S'|'s')?; + +fragment DIFF: ('\'')*; +fragment DIGIT: [0-9]; +INT: [0-9]+ ; // match integers +FLOAT: DIGIT+ '.' DIGIT* + | '.' DIGIT+; +EXP: FLOAT 'E' INT +| FLOAT 'E' '-' INT; +LINE_COMMENT : '%' .*? '\r'? '\n' -> skip ; +ID: [a-zA-Z][a-zA-Z0-9_]*; +WS: [ \t\r\n&]+ -> skip ; // toss out whitespace diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..ec81bb83325d68e1c11b43a1df5ec56846367e9f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py @@ -0,0 +1,97 @@ +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on + +@doctest_depends_on(modules=('antlr4',)) +def parse_autolev(autolev_code, include_numeric=False): + """Parses Autolev code (version 4.1) to SymPy code. + + Parameters + ========= + autolev_code : Can be an str or any object with a readlines() method (such as a file handle or StringIO). + include_numeric : boolean, optional + If True NumPy, PyDy, or other numeric code is included for numeric evaluation lines in the Autolev code. + + Returns + ======= + sympy_code : str + Equivalent SymPy and/or numpy/pydy code as the input code. + + + Example (Double Pendulum) + ========================= + >>> my_al_text = ("MOTIONVARIABLES' Q{2}', U{2}'", + ... "CONSTANTS L,M,G", + ... "NEWTONIAN N", + ... "FRAMES A,B", + ... "SIMPROT(N, A, 3, Q1)", + ... "SIMPROT(N, B, 3, Q2)", + ... "W_A_N>=U1*N3>", + ... "W_B_N>=U2*N3>", + ... "POINT O", + ... "PARTICLES P,R", + ... "P_O_P> = L*A1>", + ... "P_P_R> = L*B1>", + ... "V_O_N> = 0>", + ... "V2PTS(N, A, O, P)", + ... "V2PTS(N, B, P, R)", + ... "MASS P=M, R=M", + ... "Q1' = U1", + ... "Q2' = U2", + ... "GRAVITY(G*N1>)", + ... "ZERO = FR() + FRSTAR()", + ... "KANE()", + ... "INPUT M=1,G=9.81,L=1", + ... "INPUT Q1=.1,Q2=.2,U1=0,U2=0", + ... "INPUT TFINAL=10, INTEGSTP=.01", + ... "CODE DYNAMICS() some_filename.c") + >>> my_al_text = '\\n'.join(my_al_text) + >>> from sympy.parsing.autolev import parse_autolev + >>> print(parse_autolev(my_al_text, include_numeric=True)) + import sympy.physics.mechanics as _me + import sympy as _sm + import math as m + import numpy as _np + + q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') + q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) + l, m, g = _sm.symbols('l m g', real=True) + frame_n = _me.ReferenceFrame('n') + frame_a = _me.ReferenceFrame('a') + frame_b = _me.ReferenceFrame('b') + frame_a.orient(frame_n, 'Axis', [q1, frame_n.z]) + frame_b.orient(frame_n, 'Axis', [q2, frame_n.z]) + frame_a.set_ang_vel(frame_n, u1*frame_n.z) + frame_b.set_ang_vel(frame_n, u2*frame_n.z) + point_o = _me.Point('o') + particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) + particle_r = _me.Particle('r', _me.Point('r_pt'), _sm.Symbol('m')) + particle_p.point.set_pos(point_o, l*frame_a.x) + particle_r.point.set_pos(particle_p.point, l*frame_b.x) + point_o.set_vel(frame_n, 0) + particle_p.point.v2pt_theory(point_o,frame_n,frame_a) + particle_r.point.v2pt_theory(particle_p.point,frame_n,frame_b) + particle_p.mass = m + particle_r.mass = m + force_p = particle_p.mass*(g*frame_n.x) + force_r = particle_r.mass*(g*frame_n.x) + kd_eqs = [q1_d - u1, q2_d - u2] + forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x)), (particle_r.point,particle_r.mass*(g*frame_n.x))] + kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u1, u2], kd_eqs = kd_eqs) + fr, frstar = kane.kanes_equations([particle_p, particle_r], forceList) + zero = fr+frstar + from pydy.system import System + sys = System(kane, constants = {l:1, m:1, g:9.81}, + specifieds={}, + initial_conditions={q1:.1, q2:.2, u1:0, u2:0}, + times = _np.linspace(0.0, 10, 10/.01)) + + y=sys.integrate() + + """ + + _autolev = import_module( + 'sympy.parsing.autolev._parse_autolev_antlr', + import_kwargs={'fromlist': ['X']}) + + if _autolev is not None: + return _autolev.parse_autolev(autolev_code, include_numeric) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..9b71e9f51fd455558a9eb42dc840604c6c96e4b3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py @@ -0,0 +1,5 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py new file mode 100644 index 0000000000000000000000000000000000000000..f3b3b1d27ade809a63d9fd328a1572c17625443e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py @@ -0,0 +1,253 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + + +def serializedATN(): + return [ + 4,0,49,393,6,-1,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5, + 2,6,7,6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2, + 13,7,13,2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7, + 19,2,20,7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2, + 26,7,26,2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7, + 32,2,33,7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2, + 39,7,39,2,40,7,40,2,41,7,41,2,42,7,42,2,43,7,43,2,44,7,44,2,45,7, + 45,2,46,7,46,2,47,7,47,2,48,7,48,2,49,7,49,2,50,7,50,1,0,1,0,1,1, + 1,1,1,2,1,2,1,3,1,3,1,3,1,4,1,4,1,4,1,5,1,5,1,5,1,6,1,6,1,6,1,7, + 1,7,1,7,1,8,1,8,1,8,1,9,1,9,1,10,1,10,1,11,1,11,1,12,1,12,1,13,1, + 13,1,14,1,14,1,15,1,15,1,16,1,16,1,17,1,17,1,18,1,18,1,19,1,19,1, + 20,1,20,1,21,1,21,1,21,1,22,1,22,1,22,1,22,1,23,1,23,1,24,1,24,1, + 25,1,25,1,26,1,26,1,26,1,26,1,26,1,27,1,27,1,27,1,27,1,27,1,27,1, + 27,1,27,1,28,1,28,1,28,1,28,1,28,1,28,3,28,184,8,28,1,29,1,29,1, + 29,1,29,1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,30,1,31,1,31,1,31,1, + 31,1,31,1,31,1,31,1,31,1,31,1,31,1,31,1,32,1,32,1,32,1,32,1,32,1, + 32,1,32,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,34,1, + 34,1,34,1,34,1,34,1,34,3,34,232,8,34,1,35,1,35,1,35,1,35,1,35,1, + 35,3,35,240,8,35,1,36,1,36,1,36,1,36,1,36,1,36,1,36,1,36,1,36,3, + 36,251,8,36,1,37,1,37,1,37,1,37,1,37,1,37,3,37,259,8,37,1,38,1,38, + 1,38,1,38,1,38,1,38,1,38,1,38,1,38,3,38,270,8,38,1,39,1,39,1,39, + 1,39,1,39,1,39,1,39,1,39,1,39,1,39,3,39,282,8,39,1,40,1,40,1,40, + 1,40,1,40,1,40,1,40,1,40,1,40,1,40,1,41,1,41,1,41,1,41,1,41,1,41, + 1,41,1,41,1,41,3,41,303,8,41,1,42,1,42,1,42,1,42,1,42,1,42,1,42, + 1,42,1,42,1,42,1,42,1,42,1,42,1,42,1,42,3,42,320,8,42,1,43,5,43, + 323,8,43,10,43,12,43,326,9,43,1,44,1,44,1,45,4,45,331,8,45,11,45, + 12,45,332,1,46,4,46,336,8,46,11,46,12,46,337,1,46,1,46,5,46,342, + 8,46,10,46,12,46,345,9,46,1,46,1,46,4,46,349,8,46,11,46,12,46,350, + 3,46,353,8,46,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,3,47, + 364,8,47,1,48,1,48,5,48,368,8,48,10,48,12,48,371,9,48,1,48,3,48, + 374,8,48,1,48,1,48,1,48,1,48,1,49,1,49,5,49,382,8,49,10,49,12,49, + 385,9,49,1,50,4,50,388,8,50,11,50,12,50,389,1,50,1,50,1,369,0,51, + 1,1,3,2,5,3,7,4,9,5,11,6,13,7,15,8,17,9,19,10,21,11,23,12,25,13, + 27,14,29,15,31,16,33,17,35,18,37,19,39,20,41,21,43,22,45,23,47,24, + 49,25,51,26,53,27,55,28,57,29,59,30,61,31,63,32,65,33,67,34,69,35, + 71,36,73,37,75,38,77,39,79,40,81,41,83,42,85,43,87,0,89,0,91,44, + 93,45,95,46,97,47,99,48,101,49,1,0,24,2,0,77,77,109,109,2,0,65,65, + 97,97,2,0,83,83,115,115,2,0,73,73,105,105,2,0,78,78,110,110,2,0, + 69,69,101,101,2,0,82,82,114,114,2,0,84,84,116,116,2,0,80,80,112, + 112,2,0,85,85,117,117,2,0,79,79,111,111,2,0,86,86,118,118,2,0,89, + 89,121,121,2,0,67,67,99,99,2,0,68,68,100,100,2,0,87,87,119,119,2, + 0,70,70,102,102,2,0,66,66,98,98,2,0,76,76,108,108,2,0,71,71,103, + 103,1,0,48,57,2,0,65,90,97,122,4,0,48,57,65,90,95,95,97,122,4,0, + 9,10,13,13,32,32,38,38,410,0,1,1,0,0,0,0,3,1,0,0,0,0,5,1,0,0,0,0, + 7,1,0,0,0,0,9,1,0,0,0,0,11,1,0,0,0,0,13,1,0,0,0,0,15,1,0,0,0,0,17, + 1,0,0,0,0,19,1,0,0,0,0,21,1,0,0,0,0,23,1,0,0,0,0,25,1,0,0,0,0,27, + 1,0,0,0,0,29,1,0,0,0,0,31,1,0,0,0,0,33,1,0,0,0,0,35,1,0,0,0,0,37, + 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1,0,0,0,71,233,1,0,0,0,73,241,1,0,0,0,75,252,1,0,0,0,77,260,1,0, + 0,0,79,271,1,0,0,0,81,283,1,0,0,0,83,293,1,0,0,0,85,304,1,0,0,0, + 87,324,1,0,0,0,89,327,1,0,0,0,91,330,1,0,0,0,93,352,1,0,0,0,95,363, + 1,0,0,0,97,365,1,0,0,0,99,379,1,0,0,0,101,387,1,0,0,0,103,104,5, + 91,0,0,104,2,1,0,0,0,105,106,5,93,0,0,106,4,1,0,0,0,107,108,5,61, + 0,0,108,6,1,0,0,0,109,110,5,43,0,0,110,111,5,61,0,0,111,8,1,0,0, + 0,112,113,5,45,0,0,113,114,5,61,0,0,114,10,1,0,0,0,115,116,5,58, + 0,0,116,117,5,61,0,0,117,12,1,0,0,0,118,119,5,42,0,0,119,120,5,61, + 0,0,120,14,1,0,0,0,121,122,5,47,0,0,122,123,5,61,0,0,123,16,1,0, + 0,0,124,125,5,94,0,0,125,126,5,61,0,0,126,18,1,0,0,0,127,128,5,44, + 0,0,128,20,1,0,0,0,129,130,5,39,0,0,130,22,1,0,0,0,131,132,5,40, + 0,0,132,24,1,0,0,0,133,134,5,41,0,0,134,26,1,0,0,0,135,136,5,123, + 0,0,136,28,1,0,0,0,137,138,5,125,0,0,138,30,1,0,0,0,139,140,5,58, + 0,0,140,32,1,0,0,0,141,142,5,43,0,0,142,34,1,0,0,0,143,144,5,45, + 0,0,144,36,1,0,0,0,145,146,5,59,0,0,146,38,1,0,0,0,147,148,5,46, + 0,0,148,40,1,0,0,0,149,150,5,62,0,0,150,42,1,0,0,0,151,152,5,48, + 0,0,152,153,5,62,0,0,153,44,1,0,0,0,154,155,5,49,0,0,155,156,5,62, + 0,0,156,157,5,62,0,0,157,46,1,0,0,0,158,159,5,94,0,0,159,48,1,0, + 0,0,160,161,5,42,0,0,161,50,1,0,0,0,162,163,5,47,0,0,163,52,1,0, + 0,0,164,165,7,0,0,0,165,166,7,1,0,0,166,167,7,2,0,0,167,168,7,2, + 0,0,168,54,1,0,0,0,169,170,7,3,0,0,170,171,7,4,0,0,171,172,7,5,0, + 0,172,173,7,6,0,0,173,174,7,7,0,0,174,175,7,3,0,0,175,176,7,1,0, + 0,176,56,1,0,0,0,177,178,7,3,0,0,178,179,7,4,0,0,179,180,7,8,0,0, + 180,181,7,9,0,0,181,183,7,7,0,0,182,184,7,2,0,0,183,182,1,0,0,0, + 183,184,1,0,0,0,184,58,1,0,0,0,185,186,7,10,0,0,186,187,7,9,0,0, + 187,188,7,7,0,0,188,189,7,8,0,0,189,190,7,9,0,0,190,191,7,7,0,0, + 191,60,1,0,0,0,192,193,7,2,0,0,193,194,7,1,0,0,194,195,7,11,0,0, + 195,196,7,5,0,0,196,62,1,0,0,0,197,198,7,9,0,0,198,199,7,4,0,0,199, + 200,7,3,0,0,200,201,7,7,0,0,201,202,7,2,0,0,202,203,7,12,0,0,203, + 204,7,2,0,0,204,205,7,7,0,0,205,206,7,5,0,0,206,207,7,0,0,0,207, + 64,1,0,0,0,208,209,7,5,0,0,209,210,7,4,0,0,210,211,7,13,0,0,211, + 212,7,10,0,0,212,213,7,14,0,0,213,214,7,5,0,0,214,66,1,0,0,0,215, + 216,7,4,0,0,216,217,7,5,0,0,217,218,7,15,0,0,218,219,7,7,0,0,219, + 220,7,10,0,0,220,221,7,4,0,0,221,222,7,3,0,0,222,223,7,1,0,0,223, + 224,7,4,0,0,224,68,1,0,0,0,225,226,7,16,0,0,226,227,7,6,0,0,227, + 228,7,1,0,0,228,229,7,0,0,0,229,231,7,5,0,0,230,232,7,2,0,0,231, + 230,1,0,0,0,231,232,1,0,0,0,232,70,1,0,0,0,233,234,7,17,0,0,234, + 235,7,10,0,0,235,236,7,14,0,0,236,237,7,3,0,0,237,239,7,5,0,0,238, + 240,7,2,0,0,239,238,1,0,0,0,239,240,1,0,0,0,240,72,1,0,0,0,241,242, + 7,8,0,0,242,243,7,1,0,0,243,244,7,6,0,0,244,245,7,7,0,0,245,246, + 7,3,0,0,246,247,7,13,0,0,247,248,7,18,0,0,248,250,7,5,0,0,249,251, + 7,2,0,0,250,249,1,0,0,0,250,251,1,0,0,0,251,74,1,0,0,0,252,253,7, + 8,0,0,253,254,7,10,0,0,254,255,7,3,0,0,255,256,7,4,0,0,256,258,7, + 7,0,0,257,259,7,2,0,0,258,257,1,0,0,0,258,259,1,0,0,0,259,76,1,0, + 0,0,260,261,7,13,0,0,261,262,7,10,0,0,262,263,7,4,0,0,263,264,7, + 2,0,0,264,265,7,7,0,0,265,266,7,1,0,0,266,267,7,4,0,0,267,269,7, + 7,0,0,268,270,7,2,0,0,269,268,1,0,0,0,269,270,1,0,0,0,270,78,1,0, + 0,0,271,272,7,2,0,0,272,273,7,8,0,0,273,274,7,5,0,0,274,275,7,13, + 0,0,275,276,7,3,0,0,276,277,7,16,0,0,277,278,7,3,0,0,278,279,7,5, + 0,0,279,281,7,14,0,0,280,282,7,2,0,0,281,280,1,0,0,0,281,282,1,0, + 0,0,282,80,1,0,0,0,283,284,7,3,0,0,284,285,7,0,0,0,285,286,7,1,0, + 0,286,287,7,19,0,0,287,288,7,3,0,0,288,289,7,4,0,0,289,290,7,1,0, + 0,290,291,7,6,0,0,291,292,7,12,0,0,292,82,1,0,0,0,293,294,7,11,0, + 0,294,295,7,1,0,0,295,296,7,6,0,0,296,297,7,3,0,0,297,298,7,1,0, + 0,298,299,7,17,0,0,299,300,7,18,0,0,300,302,7,5,0,0,301,303,7,2, + 0,0,302,301,1,0,0,0,302,303,1,0,0,0,303,84,1,0,0,0,304,305,7,0,0, + 0,305,306,7,10,0,0,306,307,7,7,0,0,307,308,7,3,0,0,308,309,7,10, + 0,0,309,310,7,4,0,0,310,311,7,11,0,0,311,312,7,1,0,0,312,313,7,6, + 0,0,313,314,7,3,0,0,314,315,7,1,0,0,315,316,7,17,0,0,316,317,7,18, + 0,0,317,319,7,5,0,0,318,320,7,2,0,0,319,318,1,0,0,0,319,320,1,0, + 0,0,320,86,1,0,0,0,321,323,5,39,0,0,322,321,1,0,0,0,323,326,1,0, + 0,0,324,322,1,0,0,0,324,325,1,0,0,0,325,88,1,0,0,0,326,324,1,0,0, + 0,327,328,7,20,0,0,328,90,1,0,0,0,329,331,7,20,0,0,330,329,1,0,0, + 0,331,332,1,0,0,0,332,330,1,0,0,0,332,333,1,0,0,0,333,92,1,0,0,0, + 334,336,3,89,44,0,335,334,1,0,0,0,336,337,1,0,0,0,337,335,1,0,0, + 0,337,338,1,0,0,0,338,339,1,0,0,0,339,343,5,46,0,0,340,342,3,89, + 44,0,341,340,1,0,0,0,342,345,1,0,0,0,343,341,1,0,0,0,343,344,1,0, + 0,0,344,353,1,0,0,0,345,343,1,0,0,0,346,348,5,46,0,0,347,349,3,89, + 44,0,348,347,1,0,0,0,349,350,1,0,0,0,350,348,1,0,0,0,350,351,1,0, + 0,0,351,353,1,0,0,0,352,335,1,0,0,0,352,346,1,0,0,0,353,94,1,0,0, + 0,354,355,3,93,46,0,355,356,5,69,0,0,356,357,3,91,45,0,357,364,1, + 0,0,0,358,359,3,93,46,0,359,360,5,69,0,0,360,361,5,45,0,0,361,362, + 3,91,45,0,362,364,1,0,0,0,363,354,1,0,0,0,363,358,1,0,0,0,364,96, + 1,0,0,0,365,369,5,37,0,0,366,368,9,0,0,0,367,366,1,0,0,0,368,371, + 1,0,0,0,369,370,1,0,0,0,369,367,1,0,0,0,370,373,1,0,0,0,371,369, + 1,0,0,0,372,374,5,13,0,0,373,372,1,0,0,0,373,374,1,0,0,0,374,375, + 1,0,0,0,375,376,5,10,0,0,376,377,1,0,0,0,377,378,6,48,0,0,378,98, + 1,0,0,0,379,383,7,21,0,0,380,382,7,22,0,0,381,380,1,0,0,0,382,385, + 1,0,0,0,383,381,1,0,0,0,383,384,1,0,0,0,384,100,1,0,0,0,385,383, + 1,0,0,0,386,388,7,23,0,0,387,386,1,0,0,0,388,389,1,0,0,0,389,387, + 1,0,0,0,389,390,1,0,0,0,390,391,1,0,0,0,391,392,6,50,0,0,392,102, + 1,0,0,0,21,0,183,231,239,250,258,269,281,302,319,324,332,337,343, + 350,352,363,369,373,383,389,1,6,0,0 + ] + +class AutolevLexer(Lexer): + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + T__0 = 1 + T__1 = 2 + T__2 = 3 + T__3 = 4 + T__4 = 5 + T__5 = 6 + T__6 = 7 + T__7 = 8 + T__8 = 9 + T__9 = 10 + T__10 = 11 + T__11 = 12 + T__12 = 13 + T__13 = 14 + T__14 = 15 + T__15 = 16 + T__16 = 17 + T__17 = 18 + T__18 = 19 + T__19 = 20 + T__20 = 21 + T__21 = 22 + T__22 = 23 + T__23 = 24 + T__24 = 25 + T__25 = 26 + Mass = 27 + Inertia = 28 + Input = 29 + Output = 30 + Save = 31 + UnitSystem = 32 + Encode = 33 + Newtonian = 34 + Frames = 35 + Bodies = 36 + Particles = 37 + Points = 38 + Constants = 39 + Specifieds = 40 + Imaginary = 41 + Variables = 42 + MotionVariables = 43 + INT = 44 + FLOAT = 45 + EXP = 46 + LINE_COMMENT = 47 + ID = 48 + WS = 49 + + channelNames = [ u"DEFAULT_TOKEN_CHANNEL", u"HIDDEN" ] + + modeNames = [ "DEFAULT_MODE" ] + + literalNames = [ "", + "'['", "']'", "'='", "'+='", "'-='", "':='", "'*='", "'/='", + "'^='", "','", "'''", "'('", "')'", "'{'", "'}'", "':'", "'+'", + "'-'", "';'", "'.'", "'>'", "'0>'", "'1>>'", "'^'", "'*'", "'/'" ] + + symbolicNames = [ "", + "Mass", "Inertia", "Input", "Output", "Save", "UnitSystem", + "Encode", "Newtonian", "Frames", "Bodies", "Particles", "Points", + "Constants", "Specifieds", "Imaginary", "Variables", "MotionVariables", + "INT", "FLOAT", "EXP", "LINE_COMMENT", "ID", "WS" ] + + ruleNames = [ "T__0", "T__1", "T__2", "T__3", "T__4", "T__5", "T__6", + "T__7", "T__8", "T__9", "T__10", "T__11", "T__12", "T__13", + "T__14", "T__15", "T__16", "T__17", "T__18", "T__19", + "T__20", "T__21", "T__22", "T__23", "T__24", "T__25", + "Mass", "Inertia", "Input", "Output", "Save", "UnitSystem", + "Encode", "Newtonian", "Frames", "Bodies", "Particles", + "Points", "Constants", "Specifieds", "Imaginary", "Variables", + "MotionVariables", "DIFF", "DIGIT", "INT", "FLOAT", "EXP", + "LINE_COMMENT", "ID", "WS" ] + + grammarFileName = "Autolev.g4" + + def __init__(self, input=None, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = LexerATNSimulator(self, self.atn, self.decisionsToDFA, PredictionContextCache()) + self._actions = None + self._predicates = None + + diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py new file mode 100644 index 0000000000000000000000000000000000000000..6f391a298a71ecf2d04cf921a919cbb68b181fab --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py @@ -0,0 +1,421 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +if __name__ is not None and "." in __name__: + from .autolevparser import AutolevParser +else: + from autolevparser import AutolevParser + +# This class defines a complete listener for a parse tree produced by AutolevParser. +class AutolevListener(ParseTreeListener): + + # Enter a parse tree produced by AutolevParser#prog. + def enterProg(self, ctx:AutolevParser.ProgContext): + pass + + # Exit a parse tree produced by AutolevParser#prog. + def exitProg(self, ctx:AutolevParser.ProgContext): + pass + + + # Enter a parse tree produced by AutolevParser#stat. + def enterStat(self, ctx:AutolevParser.StatContext): + pass + + # Exit a parse tree produced by AutolevParser#stat. + def exitStat(self, ctx:AutolevParser.StatContext): + pass + + + # Enter a parse tree produced by AutolevParser#vecAssign. + def enterVecAssign(self, ctx:AutolevParser.VecAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#vecAssign. + def exitVecAssign(self, ctx:AutolevParser.VecAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#indexAssign. + def enterIndexAssign(self, ctx:AutolevParser.IndexAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#indexAssign. + def exitIndexAssign(self, ctx:AutolevParser.IndexAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#regularAssign. + def enterRegularAssign(self, ctx:AutolevParser.RegularAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#regularAssign. + def exitRegularAssign(self, ctx:AutolevParser.RegularAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#equals. + def enterEquals(self, ctx:AutolevParser.EqualsContext): + pass + + # Exit a parse tree produced by AutolevParser#equals. + def exitEquals(self, ctx:AutolevParser.EqualsContext): + pass + + + # Enter a parse tree produced by AutolevParser#index. + def enterIndex(self, ctx:AutolevParser.IndexContext): + pass + + # Exit a parse tree produced by AutolevParser#index. + def exitIndex(self, ctx:AutolevParser.IndexContext): + pass + + + # Enter a parse tree produced by AutolevParser#diff. + def enterDiff(self, ctx:AutolevParser.DiffContext): + pass + + # Exit a parse tree produced by AutolevParser#diff. + def exitDiff(self, ctx:AutolevParser.DiffContext): + pass + + + # Enter a parse tree produced by AutolevParser#functionCall. + def enterFunctionCall(self, ctx:AutolevParser.FunctionCallContext): + pass + + # Exit a parse tree produced by AutolevParser#functionCall. + def exitFunctionCall(self, ctx:AutolevParser.FunctionCallContext): + pass + + + # Enter a parse tree produced by AutolevParser#varDecl. + def enterVarDecl(self, ctx:AutolevParser.VarDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#varDecl. + def exitVarDecl(self, ctx:AutolevParser.VarDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#varType. + def enterVarType(self, ctx:AutolevParser.VarTypeContext): + pass + + # Exit a parse tree produced by AutolevParser#varType. + def exitVarType(self, ctx:AutolevParser.VarTypeContext): + pass + + + # Enter a parse tree produced by AutolevParser#varDecl2. + def enterVarDecl2(self, ctx:AutolevParser.VarDecl2Context): + pass + + # Exit a parse tree produced by AutolevParser#varDecl2. + def exitVarDecl2(self, ctx:AutolevParser.VarDecl2Context): + pass + + + # Enter a parse tree produced by AutolevParser#ranges. + def enterRanges(self, ctx:AutolevParser.RangesContext): + pass + + # Exit a parse tree produced by AutolevParser#ranges. + def exitRanges(self, ctx:AutolevParser.RangesContext): + pass + + + # Enter a parse tree produced by AutolevParser#massDecl. + def enterMassDecl(self, ctx:AutolevParser.MassDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#massDecl. + def exitMassDecl(self, ctx:AutolevParser.MassDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#massDecl2. + def enterMassDecl2(self, ctx:AutolevParser.MassDecl2Context): + pass + + # Exit a parse tree produced by AutolevParser#massDecl2. + def exitMassDecl2(self, ctx:AutolevParser.MassDecl2Context): + pass + + + # Enter a parse tree produced by AutolevParser#inertiaDecl. + def enterInertiaDecl(self, ctx:AutolevParser.InertiaDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#inertiaDecl. + def exitInertiaDecl(self, ctx:AutolevParser.InertiaDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrix. + def enterMatrix(self, ctx:AutolevParser.MatrixContext): + pass + + # Exit a parse tree produced by AutolevParser#matrix. + def exitMatrix(self, ctx:AutolevParser.MatrixContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrixInOutput. + def enterMatrixInOutput(self, ctx:AutolevParser.MatrixInOutputContext): + pass + + # Exit a parse tree produced by AutolevParser#matrixInOutput. + def exitMatrixInOutput(self, ctx:AutolevParser.MatrixInOutputContext): + pass + + + # Enter a parse tree produced by AutolevParser#codeCommands. + def enterCodeCommands(self, ctx:AutolevParser.CodeCommandsContext): + pass + + # Exit a parse tree produced by AutolevParser#codeCommands. + def exitCodeCommands(self, ctx:AutolevParser.CodeCommandsContext): + pass + + + # Enter a parse tree produced by AutolevParser#settings. + def enterSettings(self, ctx:AutolevParser.SettingsContext): + pass + + # Exit a parse tree produced by AutolevParser#settings. + def exitSettings(self, ctx:AutolevParser.SettingsContext): + pass + + + # Enter a parse tree produced by AutolevParser#units. + def enterUnits(self, ctx:AutolevParser.UnitsContext): + pass + + # Exit a parse tree produced by AutolevParser#units. + def exitUnits(self, ctx:AutolevParser.UnitsContext): + pass + + + # Enter a parse tree produced by AutolevParser#inputs. + def enterInputs(self, ctx:AutolevParser.InputsContext): + pass + + # Exit a parse tree produced by AutolevParser#inputs. + def exitInputs(self, ctx:AutolevParser.InputsContext): + pass + + + # Enter a parse tree produced by AutolevParser#id_diff. + def enterId_diff(self, ctx:AutolevParser.Id_diffContext): + pass + + # Exit a parse tree produced by AutolevParser#id_diff. + def exitId_diff(self, ctx:AutolevParser.Id_diffContext): + pass + + + # Enter a parse tree produced by AutolevParser#inputs2. + def enterInputs2(self, ctx:AutolevParser.Inputs2Context): + pass + + # Exit a parse tree produced by AutolevParser#inputs2. + def exitInputs2(self, ctx:AutolevParser.Inputs2Context): + pass + + + # Enter a parse tree produced by AutolevParser#outputs. + def enterOutputs(self, ctx:AutolevParser.OutputsContext): + pass + + # Exit a parse tree produced by AutolevParser#outputs. + def exitOutputs(self, ctx:AutolevParser.OutputsContext): + pass + + + # Enter a parse tree produced by AutolevParser#outputs2. + def enterOutputs2(self, ctx:AutolevParser.Outputs2Context): + pass + + # Exit a parse tree produced by AutolevParser#outputs2. + def exitOutputs2(self, ctx:AutolevParser.Outputs2Context): + pass + + + # Enter a parse tree produced by AutolevParser#codegen. + def enterCodegen(self, ctx:AutolevParser.CodegenContext): + pass + + # Exit a parse tree produced by AutolevParser#codegen. + def exitCodegen(self, ctx:AutolevParser.CodegenContext): + pass + + + # Enter a parse tree produced by AutolevParser#commands. + def enterCommands(self, ctx:AutolevParser.CommandsContext): + pass + + # Exit a parse tree produced by AutolevParser#commands. + def exitCommands(self, ctx:AutolevParser.CommandsContext): + pass + + + # Enter a parse tree produced by AutolevParser#vec. + def enterVec(self, ctx:AutolevParser.VecContext): + pass + + # Exit a parse tree produced by AutolevParser#vec. + def exitVec(self, ctx:AutolevParser.VecContext): + pass + + + # Enter a parse tree produced by AutolevParser#parens. + def enterParens(self, ctx:AutolevParser.ParensContext): + pass + + # Exit a parse tree produced by AutolevParser#parens. + def exitParens(self, ctx:AutolevParser.ParensContext): + pass + + + # Enter a parse tree produced by AutolevParser#VectorOrDyadic. + def enterVectorOrDyadic(self, ctx:AutolevParser.VectorOrDyadicContext): + pass + + # Exit a parse tree produced by AutolevParser#VectorOrDyadic. + def exitVectorOrDyadic(self, ctx:AutolevParser.VectorOrDyadicContext): + pass + + + # Enter a parse tree produced by AutolevParser#Exponent. + def enterExponent(self, ctx:AutolevParser.ExponentContext): + pass + + # Exit a parse tree produced by AutolevParser#Exponent. + def exitExponent(self, ctx:AutolevParser.ExponentContext): + pass + + + # Enter a parse tree produced by AutolevParser#MulDiv. + def enterMulDiv(self, ctx:AutolevParser.MulDivContext): + pass + + # Exit a parse tree produced by AutolevParser#MulDiv. + def exitMulDiv(self, ctx:AutolevParser.MulDivContext): + pass + + + # Enter a parse tree produced by AutolevParser#AddSub. + def enterAddSub(self, ctx:AutolevParser.AddSubContext): + pass + + # Exit a parse tree produced by AutolevParser#AddSub. + def exitAddSub(self, ctx:AutolevParser.AddSubContext): + pass + + + # Enter a parse tree produced by AutolevParser#float. + def enterFloat(self, ctx:AutolevParser.FloatContext): + pass + + # Exit a parse tree produced by AutolevParser#float. + def exitFloat(self, ctx:AutolevParser.FloatContext): + pass + + + # Enter a parse tree produced by AutolevParser#int. + def enterInt(self, ctx:AutolevParser.IntContext): + pass + + # Exit a parse tree produced by AutolevParser#int. + def exitInt(self, ctx:AutolevParser.IntContext): + pass + + + # Enter a parse tree produced by AutolevParser#idEqualsExpr. + def enterIdEqualsExpr(self, ctx:AutolevParser.IdEqualsExprContext): + pass + + # Exit a parse tree produced by AutolevParser#idEqualsExpr. + def exitIdEqualsExpr(self, ctx:AutolevParser.IdEqualsExprContext): + pass + + + # Enter a parse tree produced by AutolevParser#negativeOne. + def enterNegativeOne(self, ctx:AutolevParser.NegativeOneContext): + pass + + # Exit a parse tree produced by AutolevParser#negativeOne. + def exitNegativeOne(self, ctx:AutolevParser.NegativeOneContext): + pass + + + # Enter a parse tree produced by AutolevParser#function. + def enterFunction(self, ctx:AutolevParser.FunctionContext): + pass + + # Exit a parse tree produced by AutolevParser#function. + def exitFunction(self, ctx:AutolevParser.FunctionContext): + pass + + + # Enter a parse tree produced by AutolevParser#rangess. + def enterRangess(self, ctx:AutolevParser.RangessContext): + pass + + # Exit a parse tree produced by AutolevParser#rangess. + def exitRangess(self, ctx:AutolevParser.RangessContext): + pass + + + # Enter a parse tree produced by AutolevParser#colon. + def enterColon(self, ctx:AutolevParser.ColonContext): + pass + + # Exit a parse tree produced by AutolevParser#colon. + def exitColon(self, ctx:AutolevParser.ColonContext): + pass + + + # Enter a parse tree produced by AutolevParser#id. + def enterId(self, ctx:AutolevParser.IdContext): + pass + + # Exit a parse tree produced by AutolevParser#id. + def exitId(self, ctx:AutolevParser.IdContext): + pass + + + # Enter a parse tree produced by AutolevParser#exp. + def enterExp(self, ctx:AutolevParser.ExpContext): + pass + + # Exit a parse tree produced by AutolevParser#exp. + def exitExp(self, ctx:AutolevParser.ExpContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrices. + def enterMatrices(self, ctx:AutolevParser.MatricesContext): + pass + + # Exit a parse tree produced by AutolevParser#matrices. + def exitMatrices(self, ctx:AutolevParser.MatricesContext): + pass + + + # Enter a parse tree produced by AutolevParser#Indexing. + def enterIndexing(self, ctx:AutolevParser.IndexingContext): + pass + + # Exit a parse tree produced by AutolevParser#Indexing. + def exitIndexing(self, ctx:AutolevParser.IndexingContext): + pass + + + +del AutolevParser diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py new file mode 100644 index 0000000000000000000000000000000000000000..e63ef1c110812580d06291ee7c7ec40b6a076cea --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py @@ -0,0 +1,3063 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + +def serializedATN(): + return [ + 4,1,49,431,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5,2,6,7, + 6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2,13,7,13, + 2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7,19,2,20, + 7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2,26,7,26, + 2,27,7,27,1,0,4,0,58,8,0,11,0,12,0,59,1,1,1,1,1,1,1,1,1,1,1,1,1, + 1,3,1,69,8,1,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2, + 3,2,84,8,2,1,2,1,2,1,2,3,2,89,8,2,1,3,1,3,1,4,1,4,1,4,5,4,96,8,4, + 10,4,12,4,99,9,4,1,5,4,5,102,8,5,11,5,12,5,103,1,6,1,6,1,6,1,6,1, + 6,5,6,111,8,6,10,6,12,6,114,9,6,3,6,116,8,6,1,6,1,6,1,6,1,6,1,6, + 1,6,5,6,124,8,6,10,6,12,6,127,9,6,3,6,129,8,6,1,6,3,6,132,8,6,1, + 7,1,7,1,7,1,7,5,7,138,8,7,10,7,12,7,141,9,7,1,8,1,8,1,8,1,8,1,8, + 1,8,1,8,1,8,1,8,1,8,5,8,153,8,8,10,8,12,8,156,9,8,1,8,1,8,5,8,160, + 8,8,10,8,12,8,163,9,8,3,8,165,8,8,1,9,1,9,1,9,1,9,1,9,1,9,3,9,173, + 8,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,5,9,183,8,9,10,9,12,9,186,9, + 9,1,9,3,9,189,8,9,1,9,1,9,1,9,3,9,194,8,9,1,9,3,9,197,8,9,1,9,5, + 9,200,8,9,10,9,12,9,203,9,9,1,9,1,9,3,9,207,8,9,1,10,1,10,1,10,1, + 10,1,10,1,10,1,10,1,10,5,10,217,8,10,10,10,12,10,220,9,10,1,10,1, + 10,1,11,1,11,1,11,1,11,5,11,228,8,11,10,11,12,11,231,9,11,1,12,1, + 12,1,12,1,12,1,13,1,13,1,13,1,13,1,13,3,13,242,8,13,1,13,1,13,4, + 13,246,8,13,11,13,12,13,247,1,14,1,14,1,14,1,14,5,14,254,8,14,10, + 14,12,14,257,9,14,1,14,1,14,1,15,1,15,1,15,1,15,3,15,265,8,15,1, + 15,1,15,3,15,269,8,15,1,16,1,16,1,16,1,16,1,16,3,16,276,8,16,1,17, + 1,17,3,17,280,8,17,1,18,1,18,1,18,1,18,5,18,286,8,18,10,18,12,18, + 289,9,18,1,19,1,19,1,19,1,19,5,19,295,8,19,10,19,12,19,298,9,19, + 1,20,1,20,3,20,302,8,20,1,21,1,21,1,21,1,21,3,21,308,8,21,1,22,1, + 22,1,22,1,22,5,22,314,8,22,10,22,12,22,317,9,22,1,23,1,23,3,23,321, + 8,23,1,24,1,24,1,24,1,24,1,24,1,24,5,24,329,8,24,10,24,12,24,332, + 9,24,1,24,1,24,3,24,336,8,24,1,24,1,24,1,24,1,24,1,25,1,25,1,25, + 1,25,1,25,1,25,1,25,1,25,5,25,350,8,25,10,25,12,25,353,9,25,3,25, + 355,8,25,1,26,1,26,4,26,359,8,26,11,26,12,26,360,1,26,1,26,3,26, + 365,8,26,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,5,27,375,8,27,10, + 27,12,27,378,9,27,1,27,1,27,1,27,1,27,1,27,1,27,5,27,386,8,27,10, + 27,12,27,389,9,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,3, + 27,400,8,27,1,27,1,27,5,27,404,8,27,10,27,12,27,407,9,27,3,27,409, + 8,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27, + 1,27,1,27,1,27,5,27,426,8,27,10,27,12,27,429,9,27,1,27,0,1,54,28, + 0,2,4,6,8,10,12,14,16,18,20,22,24,26,28,30,32,34,36,38,40,42,44, + 46,48,50,52,54,0,7,1,0,3,9,1,0,27,28,1,0,17,18,2,0,10,10,19,19,1, + 0,44,45,2,0,44,46,48,48,1,0,25,26,483,0,57,1,0,0,0,2,68,1,0,0,0, + 4,88,1,0,0,0,6,90,1,0,0,0,8,92,1,0,0,0,10,101,1,0,0,0,12,131,1,0, + 0,0,14,133,1,0,0,0,16,164,1,0,0,0,18,166,1,0,0,0,20,208,1,0,0,0, + 22,223,1,0,0,0,24,232,1,0,0,0,26,236,1,0,0,0,28,249,1,0,0,0,30,268, + 1,0,0,0,32,275,1,0,0,0,34,277,1,0,0,0,36,281,1,0,0,0,38,290,1,0, + 0,0,40,299,1,0,0,0,42,303,1,0,0,0,44,309,1,0,0,0,46,318,1,0,0,0, + 48,322,1,0,0,0,50,354,1,0,0,0,52,364,1,0,0,0,54,408,1,0,0,0,56,58, + 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195,1,0,0,0,196,197,1,0,0,0,197,201,1,0,0,0,198,200,5,11,0,0,199, + 198,1,0,0,0,200,203,1,0,0,0,201,199,1,0,0,0,201,202,1,0,0,0,202, + 206,1,0,0,0,203,201,1,0,0,0,204,205,5,3,0,0,205,207,3,54,27,0,206, + 204,1,0,0,0,206,207,1,0,0,0,207,19,1,0,0,0,208,209,5,14,0,0,209, + 210,5,44,0,0,210,211,5,16,0,0,211,218,5,44,0,0,212,213,5,10,0,0, + 213,214,5,44,0,0,214,215,5,16,0,0,215,217,5,44,0,0,216,212,1,0,0, + 0,217,220,1,0,0,0,218,216,1,0,0,0,218,219,1,0,0,0,219,221,1,0,0, + 0,220,218,1,0,0,0,221,222,5,15,0,0,222,21,1,0,0,0,223,224,5,27,0, + 0,224,229,3,24,12,0,225,226,5,10,0,0,226,228,3,24,12,0,227,225,1, + 0,0,0,228,231,1,0,0,0,229,227,1,0,0,0,229,230,1,0,0,0,230,23,1,0, + 0,0,231,229,1,0,0,0,232,233,5,48,0,0,233,234,5,3,0,0,234,235,3,54, + 27,0,235,25,1,0,0,0,236,237,5,28,0,0,237,241,5,48,0,0,238,239,5, + 12,0,0,239,240,5,48,0,0,240,242,5,13,0,0,241,238,1,0,0,0,241,242, + 1,0,0,0,242,245,1,0,0,0,243,244,5,10,0,0,244,246,3,54,27,0,245,243, + 1,0,0,0,246,247,1,0,0,0,247,245,1,0,0,0,247,248,1,0,0,0,248,27,1, + 0,0,0,249,250,5,1,0,0,250,255,3,54,27,0,251,252,7,3,0,0,252,254, + 3,54,27,0,253,251,1,0,0,0,254,257,1,0,0,0,255,253,1,0,0,0,255,256, + 1,0,0,0,256,258,1,0,0,0,257,255,1,0,0,0,258,259,5,2,0,0,259,29,1, + 0,0,0,260,261,5,48,0,0,261,262,5,48,0,0,262,264,5,3,0,0,263,265, + 7,4,0,0,264,263,1,0,0,0,264,265,1,0,0,0,265,269,1,0,0,0,266,269, + 5,45,0,0,267,269,5,44,0,0,268,260,1,0,0,0,268,266,1,0,0,0,268,267, + 1,0,0,0,269,31,1,0,0,0,270,276,3,36,18,0,271,276,3,38,19,0,272,276, + 3,44,22,0,273,276,3,48,24,0,274,276,3,50,25,0,275,270,1,0,0,0,275, + 271,1,0,0,0,275,272,1,0,0,0,275,273,1,0,0,0,275,274,1,0,0,0,276, + 33,1,0,0,0,277,279,5,48,0,0,278,280,7,5,0,0,279,278,1,0,0,0,279, + 280,1,0,0,0,280,35,1,0,0,0,281,282,5,32,0,0,282,287,5,48,0,0,283, + 284,5,10,0,0,284,286,5,48,0,0,285,283,1,0,0,0,286,289,1,0,0,0,287, + 285,1,0,0,0,287,288,1,0,0,0,288,37,1,0,0,0,289,287,1,0,0,0,290,291, + 5,29,0,0,291,296,3,42,21,0,292,293,5,10,0,0,293,295,3,42,21,0,294, + 292,1,0,0,0,295,298,1,0,0,0,296,294,1,0,0,0,296,297,1,0,0,0,297, + 39,1,0,0,0,298,296,1,0,0,0,299,301,5,48,0,0,300,302,3,10,5,0,301, + 300,1,0,0,0,301,302,1,0,0,0,302,41,1,0,0,0,303,304,3,40,20,0,304, + 305,5,3,0,0,305,307,3,54,27,0,306,308,3,54,27,0,307,306,1,0,0,0, + 307,308,1,0,0,0,308,43,1,0,0,0,309,310,5,30,0,0,310,315,3,46,23, + 0,311,312,5,10,0,0,312,314,3,46,23,0,313,311,1,0,0,0,314,317,1,0, + 0,0,315,313,1,0,0,0,315,316,1,0,0,0,316,45,1,0,0,0,317,315,1,0,0, + 0,318,320,3,54,27,0,319,321,3,54,27,0,320,319,1,0,0,0,320,321,1, + 0,0,0,321,47,1,0,0,0,322,323,5,48,0,0,323,335,3,12,6,0,324,325,5, + 1,0,0,325,330,3,30,15,0,326,327,5,10,0,0,327,329,3,30,15,0,328,326, + 1,0,0,0,329,332,1,0,0,0,330,328,1,0,0,0,330,331,1,0,0,0,331,333, + 1,0,0,0,332,330,1,0,0,0,333,334,5,2,0,0,334,336,1,0,0,0,335,324, + 1,0,0,0,335,336,1,0,0,0,336,337,1,0,0,0,337,338,5,48,0,0,338,339, + 5,20,0,0,339,340,5,48,0,0,340,49,1,0,0,0,341,342,5,31,0,0,342,343, + 5,48,0,0,343,344,5,20,0,0,344,355,5,48,0,0,345,346,5,33,0,0,346, + 351,5,48,0,0,347,348,5,10,0,0,348,350,5,48,0,0,349,347,1,0,0,0,350, + 353,1,0,0,0,351,349,1,0,0,0,351,352,1,0,0,0,352,355,1,0,0,0,353, + 351,1,0,0,0,354,341,1,0,0,0,354,345,1,0,0,0,355,51,1,0,0,0,356,358, + 5,48,0,0,357,359,5,21,0,0,358,357,1,0,0,0,359,360,1,0,0,0,360,358, + 1,0,0,0,360,361,1,0,0,0,361,365,1,0,0,0,362,365,5,22,0,0,363,365, + 5,23,0,0,364,356,1,0,0,0,364,362,1,0,0,0,364,363,1,0,0,0,365,53, + 1,0,0,0,366,367,6,27,-1,0,367,409,5,46,0,0,368,369,5,18,0,0,369, + 409,3,54,27,12,370,409,5,45,0,0,371,409,5,44,0,0,372,376,5,48,0, + 0,373,375,5,11,0,0,374,373,1,0,0,0,375,378,1,0,0,0,376,374,1,0,0, + 0,376,377,1,0,0,0,377,409,1,0,0,0,378,376,1,0,0,0,379,409,3,52,26, + 0,380,381,5,48,0,0,381,382,5,1,0,0,382,387,3,54,27,0,383,384,5,10, + 0,0,384,386,3,54,27,0,385,383,1,0,0,0,386,389,1,0,0,0,387,385,1, + 0,0,0,387,388,1,0,0,0,388,390,1,0,0,0,389,387,1,0,0,0,390,391,5, + 2,0,0,391,409,1,0,0,0,392,409,3,12,6,0,393,409,3,28,14,0,394,395, + 5,12,0,0,395,396,3,54,27,0,396,397,5,13,0,0,397,409,1,0,0,0,398, + 400,5,48,0,0,399,398,1,0,0,0,399,400,1,0,0,0,400,401,1,0,0,0,401, + 405,3,20,10,0,402,404,5,11,0,0,403,402,1,0,0,0,404,407,1,0,0,0,405, + 403,1,0,0,0,405,406,1,0,0,0,406,409,1,0,0,0,407,405,1,0,0,0,408, + 366,1,0,0,0,408,368,1,0,0,0,408,370,1,0,0,0,408,371,1,0,0,0,408, + 372,1,0,0,0,408,379,1,0,0,0,408,380,1,0,0,0,408,392,1,0,0,0,408, + 393,1,0,0,0,408,394,1,0,0,0,408,399,1,0,0,0,409,427,1,0,0,0,410, + 411,10,16,0,0,411,412,5,24,0,0,412,426,3,54,27,17,413,414,10,15, + 0,0,414,415,7,6,0,0,415,426,3,54,27,16,416,417,10,14,0,0,417,418, + 7,2,0,0,418,426,3,54,27,15,419,420,10,3,0,0,420,421,5,3,0,0,421, + 426,3,54,27,4,422,423,10,2,0,0,423,424,5,16,0,0,424,426,3,54,27, + 3,425,410,1,0,0,0,425,413,1,0,0,0,425,416,1,0,0,0,425,419,1,0,0, + 0,425,422,1,0,0,0,426,429,1,0,0,0,427,425,1,0,0,0,427,428,1,0,0, + 0,428,55,1,0,0,0,429,427,1,0,0,0,50,59,68,83,88,97,103,112,115,125, + 128,131,139,154,161,164,172,184,188,193,196,201,206,218,229,241, + 247,255,264,268,275,279,287,296,301,307,315,320,330,335,351,354, + 360,364,376,387,399,405,408,425,427 + ] + +class AutolevParser ( Parser ): + + grammarFileName = "Autolev.g4" + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + sharedContextCache = PredictionContextCache() + + literalNames = [ "", "'['", "']'", "'='", "'+='", "'-='", "':='", + "'*='", "'/='", "'^='", "','", "'''", "'('", "')'", + "'{'", "'}'", "':'", "'+'", "'-'", "';'", "'.'", "'>'", + "'0>'", "'1>>'", "'^'", "'*'", "'/'" ] + + symbolicNames = [ "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "Mass", "Inertia", + "Input", "Output", "Save", "UnitSystem", "Encode", + "Newtonian", "Frames", "Bodies", "Particles", "Points", + "Constants", "Specifieds", "Imaginary", "Variables", + "MotionVariables", "INT", "FLOAT", "EXP", "LINE_COMMENT", + "ID", "WS" ] + + RULE_prog = 0 + RULE_stat = 1 + RULE_assignment = 2 + RULE_equals = 3 + RULE_index = 4 + RULE_diff = 5 + RULE_functionCall = 6 + RULE_varDecl = 7 + RULE_varType = 8 + RULE_varDecl2 = 9 + RULE_ranges = 10 + RULE_massDecl = 11 + RULE_massDecl2 = 12 + RULE_inertiaDecl = 13 + RULE_matrix = 14 + RULE_matrixInOutput = 15 + RULE_codeCommands = 16 + RULE_settings = 17 + RULE_units = 18 + RULE_inputs = 19 + RULE_id_diff = 20 + RULE_inputs2 = 21 + RULE_outputs = 22 + RULE_outputs2 = 23 + RULE_codegen = 24 + RULE_commands = 25 + RULE_vec = 26 + RULE_expr = 27 + + ruleNames = [ "prog", "stat", "assignment", "equals", "index", "diff", + "functionCall", "varDecl", "varType", "varDecl2", "ranges", + "massDecl", "massDecl2", "inertiaDecl", "matrix", "matrixInOutput", + "codeCommands", "settings", "units", "inputs", "id_diff", + "inputs2", "outputs", "outputs2", "codegen", "commands", + "vec", "expr" ] + + EOF = Token.EOF + T__0=1 + T__1=2 + T__2=3 + T__3=4 + T__4=5 + T__5=6 + T__6=7 + T__7=8 + T__8=9 + T__9=10 + T__10=11 + T__11=12 + T__12=13 + T__13=14 + T__14=15 + T__15=16 + T__16=17 + T__17=18 + T__18=19 + T__19=20 + T__20=21 + T__21=22 + T__22=23 + T__23=24 + T__24=25 + T__25=26 + Mass=27 + Inertia=28 + Input=29 + Output=30 + Save=31 + UnitSystem=32 + Encode=33 + Newtonian=34 + Frames=35 + Bodies=36 + Particles=37 + Points=38 + Constants=39 + Specifieds=40 + Imaginary=41 + Variables=42 + MotionVariables=43 + INT=44 + FLOAT=45 + EXP=46 + LINE_COMMENT=47 + ID=48 + WS=49 + + def __init__(self, input:TokenStream, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = ParserATNSimulator(self, self.atn, self.decisionsToDFA, self.sharedContextCache) + self._predicates = None + + + + + class ProgContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def stat(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.StatContext) + else: + return self.getTypedRuleContext(AutolevParser.StatContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_prog + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterProg" ): + listener.enterProg(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitProg" ): + listener.exitProg(self) + + + + + def prog(self): + + localctx = AutolevParser.ProgContext(self, self._ctx, self.state) + self.enterRule(localctx, 0, self.RULE_prog) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 57 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 56 + self.stat() + self.state = 59 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (((_la) & ~0x3f) == 0 and ((1 << _la) & 299067041120256) != 0): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class StatContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def varDecl(self): + return self.getTypedRuleContext(AutolevParser.VarDeclContext,0) + + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def codeCommands(self): + return self.getTypedRuleContext(AutolevParser.CodeCommandsContext,0) + + + def massDecl(self): + return self.getTypedRuleContext(AutolevParser.MassDeclContext,0) + + + def inertiaDecl(self): + return self.getTypedRuleContext(AutolevParser.InertiaDeclContext,0) + + + def assignment(self): + return self.getTypedRuleContext(AutolevParser.AssignmentContext,0) + + + def settings(self): + return self.getTypedRuleContext(AutolevParser.SettingsContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_stat + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterStat" ): + listener.enterStat(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitStat" ): + listener.exitStat(self) + + + + + def stat(self): + + localctx = AutolevParser.StatContext(self, self._ctx, self.state) + self.enterRule(localctx, 2, self.RULE_stat) + try: + self.state = 68 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,1,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 61 + self.varDecl() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 62 + self.functionCall() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 63 + self.codeCommands() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 64 + self.massDecl() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 65 + self.inertiaDecl() + pass + + elif la_ == 6: + self.enterOuterAlt(localctx, 6) + self.state = 66 + self.assignment() + pass + + elif la_ == 7: + self.enterOuterAlt(localctx, 7) + self.state = 67 + self.settings() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AssignmentContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_assignment + + + def copyFrom(self, ctx:ParserRuleContext): + super().copyFrom(ctx) + + + + class VecAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def vec(self): + return self.getTypedRuleContext(AutolevParser.VecContext,0) + + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVecAssign" ): + listener.enterVecAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVecAssign" ): + listener.exitVecAssign(self) + + + class RegularAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + def diff(self): + return self.getTypedRuleContext(AutolevParser.DiffContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRegularAssign" ): + listener.enterRegularAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRegularAssign" ): + listener.exitRegularAssign(self) + + + class IndexAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def index(self): + return self.getTypedRuleContext(AutolevParser.IndexContext,0) + + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndexAssign" ): + listener.enterIndexAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndexAssign" ): + listener.exitIndexAssign(self) + + + + def assignment(self): + + localctx = AutolevParser.AssignmentContext(self, self._ctx, self.state) + self.enterRule(localctx, 4, self.RULE_assignment) + self._la = 0 # Token type + try: + self.state = 88 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,3,self._ctx) + if la_ == 1: + localctx = AutolevParser.VecAssignContext(self, localctx) + self.enterOuterAlt(localctx, 1) + self.state = 70 + self.vec() + self.state = 71 + self.equals() + self.state = 72 + self.expr(0) + pass + + elif la_ == 2: + localctx = AutolevParser.IndexAssignContext(self, localctx) + self.enterOuterAlt(localctx, 2) + self.state = 74 + self.match(AutolevParser.ID) + self.state = 75 + self.match(AutolevParser.T__0) + self.state = 76 + self.index() + self.state = 77 + self.match(AutolevParser.T__1) + self.state = 78 + self.equals() + self.state = 79 + self.expr(0) + pass + + elif la_ == 3: + localctx = AutolevParser.RegularAssignContext(self, localctx) + self.enterOuterAlt(localctx, 3) + self.state = 81 + self.match(AutolevParser.ID) + self.state = 83 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==11: + self.state = 82 + self.diff() + + + self.state = 85 + self.equals() + self.state = 86 + self.expr(0) + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class EqualsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_equals + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterEquals" ): + listener.enterEquals(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitEquals" ): + listener.exitEquals(self) + + + + + def equals(self): + + localctx = AutolevParser.EqualsContext(self, self._ctx, self.state) + self.enterRule(localctx, 6, self.RULE_equals) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 90 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 1016) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class IndexContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_index + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndex" ): + listener.enterIndex(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndex" ): + listener.exitIndex(self) + + + + + def index(self): + + localctx = AutolevParser.IndexContext(self, self._ctx, self.state) + self.enterRule(localctx, 8, self.RULE_index) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 92 + self.expr(0) + self.state = 97 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 93 + self.match(AutolevParser.T__9) + self.state = 94 + self.expr(0) + self.state = 99 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class DiffContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_diff + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterDiff" ): + listener.enterDiff(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitDiff" ): + listener.exitDiff(self) + + + + + def diff(self): + + localctx = AutolevParser.DiffContext(self, self._ctx, self.state) + self.enterRule(localctx, 10, self.RULE_diff) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 101 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 100 + self.match(AutolevParser.T__10) + self.state = 103 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (_la==11): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FunctionCallContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def Mass(self): + return self.getToken(AutolevParser.Mass, 0) + + def Inertia(self): + return self.getToken(AutolevParser.Inertia, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_functionCall + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFunctionCall" ): + listener.enterFunctionCall(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFunctionCall" ): + listener.exitFunctionCall(self) + + + + + def functionCall(self): + + localctx = AutolevParser.FunctionCallContext(self, self._ctx, self.state) + self.enterRule(localctx, 12, self.RULE_functionCall) + self._la = 0 # Token type + try: + self.state = 131 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 105 + self.match(AutolevParser.ID) + self.state = 106 + self.match(AutolevParser.T__11) + self.state = 115 + self._errHandler.sync(self) + _la = self._input.LA(1) + if ((_la) & ~0x3f) == 0 and ((1 << _la) & 404620694540290) != 0: + self.state = 107 + self.expr(0) + self.state = 112 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 108 + self.match(AutolevParser.T__9) + self.state = 109 + self.expr(0) + self.state = 114 + self._errHandler.sync(self) + _la = self._input.LA(1) + + + + self.state = 117 + self.match(AutolevParser.T__12) + pass + elif token in [27, 28]: + self.enterOuterAlt(localctx, 2) + self.state = 118 + _la = self._input.LA(1) + if not(_la==27 or _la==28): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 119 + self.match(AutolevParser.T__11) + self.state = 128 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==48: + self.state = 120 + self.match(AutolevParser.ID) + self.state = 125 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 121 + self.match(AutolevParser.T__9) + self.state = 122 + self.match(AutolevParser.ID) + self.state = 127 + self._errHandler.sync(self) + _la = self._input.LA(1) + + + + self.state = 130 + self.match(AutolevParser.T__12) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def varType(self): + return self.getTypedRuleContext(AutolevParser.VarTypeContext,0) + + + def varDecl2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.VarDecl2Context) + else: + return self.getTypedRuleContext(AutolevParser.VarDecl2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_varDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarDecl" ): + listener.enterVarDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarDecl" ): + listener.exitVarDecl(self) + + + + + def varDecl(self): + + localctx = AutolevParser.VarDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 14, self.RULE_varDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 133 + self.varType() + self.state = 134 + self.varDecl2() + self.state = 139 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 135 + self.match(AutolevParser.T__9) + self.state = 136 + self.varDecl2() + self.state = 141 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarTypeContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Newtonian(self): + return self.getToken(AutolevParser.Newtonian, 0) + + def Frames(self): + return self.getToken(AutolevParser.Frames, 0) + + def Bodies(self): + return self.getToken(AutolevParser.Bodies, 0) + + def Particles(self): + return self.getToken(AutolevParser.Particles, 0) + + def Points(self): + return self.getToken(AutolevParser.Points, 0) + + def Constants(self): + return self.getToken(AutolevParser.Constants, 0) + + def Specifieds(self): + return self.getToken(AutolevParser.Specifieds, 0) + + def Imaginary(self): + return self.getToken(AutolevParser.Imaginary, 0) + + def Variables(self): + return self.getToken(AutolevParser.Variables, 0) + + def MotionVariables(self): + return self.getToken(AutolevParser.MotionVariables, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_varType + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarType" ): + listener.enterVarType(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarType" ): + listener.exitVarType(self) + + + + + def varType(self): + + localctx = AutolevParser.VarTypeContext(self, self._ctx, self.state) + self.enterRule(localctx, 16, self.RULE_varType) + self._la = 0 # Token type + try: + self.state = 164 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [34]: + self.enterOuterAlt(localctx, 1) + self.state = 142 + self.match(AutolevParser.Newtonian) + pass + elif token in [35]: + self.enterOuterAlt(localctx, 2) + self.state = 143 + self.match(AutolevParser.Frames) + pass + elif token in [36]: + self.enterOuterAlt(localctx, 3) + self.state = 144 + self.match(AutolevParser.Bodies) + pass + elif token in [37]: + self.enterOuterAlt(localctx, 4) + self.state = 145 + self.match(AutolevParser.Particles) + pass + elif token in [38]: + self.enterOuterAlt(localctx, 5) + self.state = 146 + self.match(AutolevParser.Points) + pass + elif token in [39]: + self.enterOuterAlt(localctx, 6) + self.state = 147 + self.match(AutolevParser.Constants) + pass + elif token in [40]: + self.enterOuterAlt(localctx, 7) + self.state = 148 + self.match(AutolevParser.Specifieds) + pass + elif token in [41]: + self.enterOuterAlt(localctx, 8) + self.state = 149 + self.match(AutolevParser.Imaginary) + pass + elif token in [42]: + self.enterOuterAlt(localctx, 9) + self.state = 150 + self.match(AutolevParser.Variables) + self.state = 154 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 151 + self.match(AutolevParser.T__10) + self.state = 156 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + elif token in [43]: + self.enterOuterAlt(localctx, 10) + self.state = 157 + self.match(AutolevParser.MotionVariables) + self.state = 161 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 158 + self.match(AutolevParser.T__10) + self.state = 163 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarDecl2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def INT(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.INT) + else: + return self.getToken(AutolevParser.INT, i) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_varDecl2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarDecl2" ): + listener.enterVarDecl2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarDecl2" ): + listener.exitVarDecl2(self) + + + + + def varDecl2(self): + + localctx = AutolevParser.VarDecl2Context(self, self._ctx, self.state) + self.enterRule(localctx, 18, self.RULE_varDecl2) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 166 + self.match(AutolevParser.ID) + self.state = 172 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,15,self._ctx) + if la_ == 1: + self.state = 167 + self.match(AutolevParser.T__13) + self.state = 168 + self.match(AutolevParser.INT) + self.state = 169 + self.match(AutolevParser.T__9) + self.state = 170 + self.match(AutolevParser.INT) + self.state = 171 + self.match(AutolevParser.T__14) + + + self.state = 188 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,17,self._ctx) + if la_ == 1: + self.state = 174 + self.match(AutolevParser.T__13) + self.state = 175 + self.match(AutolevParser.INT) + self.state = 176 + self.match(AutolevParser.T__15) + self.state = 177 + self.match(AutolevParser.INT) + self.state = 184 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 178 + self.match(AutolevParser.T__9) + self.state = 179 + self.match(AutolevParser.INT) + self.state = 180 + self.match(AutolevParser.T__15) + self.state = 181 + self.match(AutolevParser.INT) + self.state = 186 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 187 + self.match(AutolevParser.T__14) + + + self.state = 193 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==14: + self.state = 190 + self.match(AutolevParser.T__13) + self.state = 191 + self.match(AutolevParser.INT) + self.state = 192 + self.match(AutolevParser.T__14) + + + self.state = 196 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==17 or _la==18: + self.state = 195 + _la = self._input.LA(1) + if not(_la==17 or _la==18): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + self.state = 201 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 198 + self.match(AutolevParser.T__10) + self.state = 203 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 206 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==3: + self.state = 204 + self.match(AutolevParser.T__2) + self.state = 205 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class RangesContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def INT(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.INT) + else: + return self.getToken(AutolevParser.INT, i) + + def getRuleIndex(self): + return AutolevParser.RULE_ranges + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRanges" ): + listener.enterRanges(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRanges" ): + listener.exitRanges(self) + + + + + def ranges(self): + + localctx = AutolevParser.RangesContext(self, self._ctx, self.state) + self.enterRule(localctx, 20, self.RULE_ranges) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 208 + self.match(AutolevParser.T__13) + self.state = 209 + self.match(AutolevParser.INT) + self.state = 210 + self.match(AutolevParser.T__15) + self.state = 211 + self.match(AutolevParser.INT) + self.state = 218 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 212 + self.match(AutolevParser.T__9) + self.state = 213 + self.match(AutolevParser.INT) + self.state = 214 + self.match(AutolevParser.T__15) + self.state = 215 + self.match(AutolevParser.INT) + self.state = 220 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 221 + self.match(AutolevParser.T__14) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MassDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Mass(self): + return self.getToken(AutolevParser.Mass, 0) + + def massDecl2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.MassDecl2Context) + else: + return self.getTypedRuleContext(AutolevParser.MassDecl2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_massDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMassDecl" ): + listener.enterMassDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMassDecl" ): + listener.exitMassDecl(self) + + + + + def massDecl(self): + + localctx = AutolevParser.MassDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 22, self.RULE_massDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 223 + self.match(AutolevParser.Mass) + self.state = 224 + self.massDecl2() + self.state = 229 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 225 + self.match(AutolevParser.T__9) + self.state = 226 + self.massDecl2() + self.state = 231 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MassDecl2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_massDecl2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMassDecl2" ): + listener.enterMassDecl2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMassDecl2" ): + listener.exitMassDecl2(self) + + + + + def massDecl2(self): + + localctx = AutolevParser.MassDecl2Context(self, self._ctx, self.state) + self.enterRule(localctx, 24, self.RULE_massDecl2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 232 + self.match(AutolevParser.ID) + self.state = 233 + self.match(AutolevParser.T__2) + self.state = 234 + self.expr(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class InertiaDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Inertia(self): + return self.getToken(AutolevParser.Inertia, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inertiaDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInertiaDecl" ): + listener.enterInertiaDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInertiaDecl" ): + listener.exitInertiaDecl(self) + + + + + def inertiaDecl(self): + + localctx = AutolevParser.InertiaDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 26, self.RULE_inertiaDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 236 + self.match(AutolevParser.Inertia) + self.state = 237 + self.match(AutolevParser.ID) + self.state = 241 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==12: + self.state = 238 + self.match(AutolevParser.T__11) + self.state = 239 + self.match(AutolevParser.ID) + self.state = 240 + self.match(AutolevParser.T__12) + + + self.state = 245 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 243 + self.match(AutolevParser.T__9) + self.state = 244 + self.expr(0) + self.state = 247 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (_la==10): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MatrixContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_matrix + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrix" ): + listener.enterMatrix(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrix" ): + listener.exitMatrix(self) + + + + + def matrix(self): + + localctx = AutolevParser.MatrixContext(self, self._ctx, self.state) + self.enterRule(localctx, 28, self.RULE_matrix) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 249 + self.match(AutolevParser.T__0) + self.state = 250 + self.expr(0) + self.state = 255 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10 or _la==19: + self.state = 251 + _la = self._input.LA(1) + if not(_la==10 or _la==19): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 252 + self.expr(0) + self.state = 257 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 258 + self.match(AutolevParser.T__1) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MatrixInOutputContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_matrixInOutput + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrixInOutput" ): + listener.enterMatrixInOutput(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrixInOutput" ): + listener.exitMatrixInOutput(self) + + + + + def matrixInOutput(self): + + localctx = AutolevParser.MatrixInOutputContext(self, self._ctx, self.state) + self.enterRule(localctx, 30, self.RULE_matrixInOutput) + self._la = 0 # Token type + try: + self.state = 268 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 260 + self.match(AutolevParser.ID) + + self.state = 261 + self.match(AutolevParser.ID) + self.state = 262 + self.match(AutolevParser.T__2) + self.state = 264 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==44 or _la==45: + self.state = 263 + _la = self._input.LA(1) + if not(_la==44 or _la==45): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + pass + elif token in [45]: + self.enterOuterAlt(localctx, 2) + self.state = 266 + self.match(AutolevParser.FLOAT) + pass + elif token in [44]: + self.enterOuterAlt(localctx, 3) + self.state = 267 + self.match(AutolevParser.INT) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CodeCommandsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def units(self): + return self.getTypedRuleContext(AutolevParser.UnitsContext,0) + + + def inputs(self): + return self.getTypedRuleContext(AutolevParser.InputsContext,0) + + + def outputs(self): + return self.getTypedRuleContext(AutolevParser.OutputsContext,0) + + + def codegen(self): + return self.getTypedRuleContext(AutolevParser.CodegenContext,0) + + + def commands(self): + return self.getTypedRuleContext(AutolevParser.CommandsContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_codeCommands + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCodeCommands" ): + listener.enterCodeCommands(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCodeCommands" ): + listener.exitCodeCommands(self) + + + + + def codeCommands(self): + + localctx = AutolevParser.CodeCommandsContext(self, self._ctx, self.state) + self.enterRule(localctx, 32, self.RULE_codeCommands) + try: + self.state = 275 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [32]: + self.enterOuterAlt(localctx, 1) + self.state = 270 + self.units() + pass + elif token in [29]: + self.enterOuterAlt(localctx, 2) + self.state = 271 + self.inputs() + pass + elif token in [30]: + self.enterOuterAlt(localctx, 3) + self.state = 272 + self.outputs() + pass + elif token in [48]: + self.enterOuterAlt(localctx, 4) + self.state = 273 + self.codegen() + pass + elif token in [31, 33]: + self.enterOuterAlt(localctx, 5) + self.state = 274 + self.commands() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SettingsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def EXP(self): + return self.getToken(AutolevParser.EXP, 0) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_settings + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterSettings" ): + listener.enterSettings(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitSettings" ): + listener.exitSettings(self) + + + + + def settings(self): + + localctx = AutolevParser.SettingsContext(self, self._ctx, self.state) + self.enterRule(localctx, 34, self.RULE_settings) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 277 + self.match(AutolevParser.ID) + self.state = 279 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,30,self._ctx) + if la_ == 1: + self.state = 278 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 404620279021568) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class UnitsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UnitSystem(self): + return self.getToken(AutolevParser.UnitSystem, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def getRuleIndex(self): + return AutolevParser.RULE_units + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterUnits" ): + listener.enterUnits(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitUnits" ): + listener.exitUnits(self) + + + + + def units(self): + + localctx = AutolevParser.UnitsContext(self, self._ctx, self.state) + self.enterRule(localctx, 36, self.RULE_units) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 281 + self.match(AutolevParser.UnitSystem) + self.state = 282 + self.match(AutolevParser.ID) + self.state = 287 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 283 + self.match(AutolevParser.T__9) + self.state = 284 + self.match(AutolevParser.ID) + self.state = 289 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class InputsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Input(self): + return self.getToken(AutolevParser.Input, 0) + + def inputs2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.Inputs2Context) + else: + return self.getTypedRuleContext(AutolevParser.Inputs2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inputs + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInputs" ): + listener.enterInputs(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInputs" ): + listener.exitInputs(self) + + + + + def inputs(self): + + localctx = AutolevParser.InputsContext(self, self._ctx, self.state) + self.enterRule(localctx, 38, self.RULE_inputs) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 290 + self.match(AutolevParser.Input) + self.state = 291 + self.inputs2() + self.state = 296 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 292 + self.match(AutolevParser.T__9) + self.state = 293 + self.inputs2() + self.state = 298 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Id_diffContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def diff(self): + return self.getTypedRuleContext(AutolevParser.DiffContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_id_diff + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterId_diff" ): + listener.enterId_diff(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitId_diff" ): + listener.exitId_diff(self) + + + + + def id_diff(self): + + localctx = AutolevParser.Id_diffContext(self, self._ctx, self.state) + self.enterRule(localctx, 40, self.RULE_id_diff) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 299 + self.match(AutolevParser.ID) + self.state = 301 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==11: + self.state = 300 + self.diff() + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Inputs2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def id_diff(self): + return self.getTypedRuleContext(AutolevParser.Id_diffContext,0) + + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inputs2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInputs2" ): + listener.enterInputs2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInputs2" ): + listener.exitInputs2(self) + + + + + def inputs2(self): + + localctx = AutolevParser.Inputs2Context(self, self._ctx, self.state) + self.enterRule(localctx, 42, self.RULE_inputs2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 303 + self.id_diff() + self.state = 304 + self.match(AutolevParser.T__2) + self.state = 305 + self.expr(0) + self.state = 307 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,34,self._ctx) + if la_ == 1: + self.state = 306 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class OutputsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Output(self): + return self.getToken(AutolevParser.Output, 0) + + def outputs2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.Outputs2Context) + else: + return self.getTypedRuleContext(AutolevParser.Outputs2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_outputs + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterOutputs" ): + listener.enterOutputs(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitOutputs" ): + listener.exitOutputs(self) + + + + + def outputs(self): + + localctx = AutolevParser.OutputsContext(self, self._ctx, self.state) + self.enterRule(localctx, 44, self.RULE_outputs) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 309 + self.match(AutolevParser.Output) + self.state = 310 + self.outputs2() + self.state = 315 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 311 + self.match(AutolevParser.T__9) + self.state = 312 + self.outputs2() + self.state = 317 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Outputs2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_outputs2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterOutputs2" ): + listener.enterOutputs2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitOutputs2" ): + listener.exitOutputs2(self) + + + + + def outputs2(self): + + localctx = AutolevParser.Outputs2Context(self, self._ctx, self.state) + self.enterRule(localctx, 46, self.RULE_outputs2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 318 + self.expr(0) + self.state = 320 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,36,self._ctx) + if la_ == 1: + self.state = 319 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CodegenContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def matrixInOutput(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.MatrixInOutputContext) + else: + return self.getTypedRuleContext(AutolevParser.MatrixInOutputContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_codegen + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCodegen" ): + listener.enterCodegen(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCodegen" ): + listener.exitCodegen(self) + + + + + def codegen(self): + + localctx = AutolevParser.CodegenContext(self, self._ctx, self.state) + self.enterRule(localctx, 48, self.RULE_codegen) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 322 + self.match(AutolevParser.ID) + self.state = 323 + self.functionCall() + self.state = 335 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==1: + self.state = 324 + self.match(AutolevParser.T__0) + self.state = 325 + self.matrixInOutput() + self.state = 330 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 326 + self.match(AutolevParser.T__9) + self.state = 327 + self.matrixInOutput() + self.state = 332 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 333 + self.match(AutolevParser.T__1) + + + self.state = 337 + self.match(AutolevParser.ID) + self.state = 338 + self.match(AutolevParser.T__19) + self.state = 339 + self.match(AutolevParser.ID) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CommandsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Save(self): + return self.getToken(AutolevParser.Save, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def Encode(self): + return self.getToken(AutolevParser.Encode, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_commands + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCommands" ): + listener.enterCommands(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCommands" ): + listener.exitCommands(self) + + + + + def commands(self): + + localctx = AutolevParser.CommandsContext(self, self._ctx, self.state) + self.enterRule(localctx, 50, self.RULE_commands) + self._la = 0 # Token type + try: + self.state = 354 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [31]: + self.enterOuterAlt(localctx, 1) + self.state = 341 + self.match(AutolevParser.Save) + self.state = 342 + self.match(AutolevParser.ID) + self.state = 343 + self.match(AutolevParser.T__19) + self.state = 344 + self.match(AutolevParser.ID) + pass + elif token in [33]: + self.enterOuterAlt(localctx, 2) + self.state = 345 + self.match(AutolevParser.Encode) + self.state = 346 + self.match(AutolevParser.ID) + self.state = 351 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 347 + self.match(AutolevParser.T__9) + self.state = 348 + self.match(AutolevParser.ID) + self.state = 353 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VecContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_vec + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVec" ): + listener.enterVec(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVec" ): + listener.exitVec(self) + + + + + def vec(self): + + localctx = AutolevParser.VecContext(self, self._ctx, self.state) + self.enterRule(localctx, 52, self.RULE_vec) + try: + self.state = 364 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 356 + self.match(AutolevParser.ID) + self.state = 358 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 357 + self.match(AutolevParser.T__20) + + else: + raise NoViableAltException(self) + self.state = 360 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,41,self._ctx) + + pass + elif token in [22]: + self.enterOuterAlt(localctx, 2) + self.state = 362 + self.match(AutolevParser.T__21) + pass + elif token in [23]: + self.enterOuterAlt(localctx, 3) + self.state = 363 + self.match(AutolevParser.T__22) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_expr + + + def copyFrom(self, ctx:ParserRuleContext): + super().copyFrom(ctx) + + + class ParensContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterParens" ): + listener.enterParens(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitParens" ): + listener.exitParens(self) + + + class VectorOrDyadicContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def vec(self): + return self.getTypedRuleContext(AutolevParser.VecContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVectorOrDyadic" ): + listener.enterVectorOrDyadic(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVectorOrDyadic" ): + listener.exitVectorOrDyadic(self) + + + class ExponentContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterExponent" ): + listener.enterExponent(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitExponent" ): + listener.exitExponent(self) + + + class MulDivContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMulDiv" ): + listener.enterMulDiv(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMulDiv" ): + listener.exitMulDiv(self) + + + class AddSubContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterAddSub" ): + listener.enterAddSub(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitAddSub" ): + listener.exitAddSub(self) + + + class FloatContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFloat" ): + listener.enterFloat(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFloat" ): + listener.exitFloat(self) + + + class IntContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInt" ): + listener.enterInt(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInt" ): + listener.exitInt(self) + + + class IdEqualsExprContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIdEqualsExpr" ): + listener.enterIdEqualsExpr(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIdEqualsExpr" ): + listener.exitIdEqualsExpr(self) + + + class NegativeOneContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterNegativeOne" ): + listener.enterNegativeOne(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitNegativeOne" ): + listener.exitNegativeOne(self) + + + class FunctionContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFunction" ): + listener.enterFunction(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFunction" ): + listener.exitFunction(self) + + + class RangessContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ranges(self): + return self.getTypedRuleContext(AutolevParser.RangesContext,0) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRangess" ): + listener.enterRangess(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRangess" ): + listener.exitRangess(self) + + + class ColonContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterColon" ): + listener.enterColon(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitColon" ): + listener.exitColon(self) + + + class IdContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterId" ): + listener.enterId(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitId" ): + listener.exitId(self) + + + class ExpContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def EXP(self): + return self.getToken(AutolevParser.EXP, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterExp" ): + listener.enterExp(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitExp" ): + listener.exitExp(self) + + + class MatricesContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def matrix(self): + return self.getTypedRuleContext(AutolevParser.MatrixContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrices" ): + listener.enterMatrices(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrices" ): + listener.exitMatrices(self) + + + class IndexingContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndexing" ): + listener.enterIndexing(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndexing" ): + listener.exitIndexing(self) + + + + def expr(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = AutolevParser.ExprContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 54 + self.enterRecursionRule(localctx, 54, self.RULE_expr, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 408 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,47,self._ctx) + if la_ == 1: + localctx = AutolevParser.ExpContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + + self.state = 367 + self.match(AutolevParser.EXP) + pass + + elif la_ == 2: + localctx = AutolevParser.NegativeOneContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 368 + self.match(AutolevParser.T__17) + self.state = 369 + self.expr(12) + pass + + elif la_ == 3: + localctx = AutolevParser.FloatContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 370 + self.match(AutolevParser.FLOAT) + pass + + elif la_ == 4: + localctx = AutolevParser.IntContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 371 + self.match(AutolevParser.INT) + pass + + elif la_ == 5: + localctx = AutolevParser.IdContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 372 + self.match(AutolevParser.ID) + self.state = 376 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,43,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 373 + self.match(AutolevParser.T__10) + self.state = 378 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,43,self._ctx) + + pass + + elif la_ == 6: + localctx = AutolevParser.VectorOrDyadicContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 379 + self.vec() + pass + + elif la_ == 7: + localctx = AutolevParser.IndexingContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 380 + self.match(AutolevParser.ID) + self.state = 381 + self.match(AutolevParser.T__0) + self.state = 382 + self.expr(0) + self.state = 387 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 383 + self.match(AutolevParser.T__9) + self.state = 384 + self.expr(0) + self.state = 389 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 390 + self.match(AutolevParser.T__1) + pass + + elif la_ == 8: + localctx = AutolevParser.FunctionContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 392 + self.functionCall() + pass + + elif la_ == 9: + localctx = AutolevParser.MatricesContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 393 + self.matrix() + pass + + elif la_ == 10: + localctx = AutolevParser.ParensContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 394 + self.match(AutolevParser.T__11) + self.state = 395 + self.expr(0) + self.state = 396 + self.match(AutolevParser.T__12) + pass + + elif la_ == 11: + localctx = AutolevParser.RangessContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 399 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==48: + self.state = 398 + self.match(AutolevParser.ID) + + + self.state = 401 + self.ranges() + self.state = 405 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,46,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 402 + self.match(AutolevParser.T__10) + self.state = 407 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,46,self._ctx) + + pass + + + self._ctx.stop = self._input.LT(-1) + self.state = 427 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,49,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + self.state = 425 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,48,self._ctx) + if la_ == 1: + localctx = AutolevParser.ExponentContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 410 + if not self.precpred(self._ctx, 16): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 16)") + self.state = 411 + self.match(AutolevParser.T__23) + self.state = 412 + self.expr(17) + pass + + elif la_ == 2: + localctx = AutolevParser.MulDivContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 413 + if not self.precpred(self._ctx, 15): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 15)") + self.state = 414 + _la = self._input.LA(1) + if not(_la==25 or _la==26): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 415 + self.expr(16) + pass + + elif la_ == 3: + localctx = AutolevParser.AddSubContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 416 + if not self.precpred(self._ctx, 14): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 14)") + self.state = 417 + _la = self._input.LA(1) + if not(_la==17 or _la==18): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 418 + self.expr(15) + pass + + elif la_ == 4: + localctx = AutolevParser.IdEqualsExprContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 419 + if not self.precpred(self._ctx, 3): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 3)") + self.state = 420 + self.match(AutolevParser.T__2) + self.state = 421 + self.expr(4) + pass + + elif la_ == 5: + localctx = AutolevParser.ColonContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 422 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 423 + self.match(AutolevParser.T__15) + self.state = 424 + self.expr(3) + pass + + + self.state = 429 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,49,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + + def sempred(self, localctx:RuleContext, ruleIndex:int, predIndex:int): + if self._predicates == None: + self._predicates = dict() + self._predicates[27] = self.expr_sempred + pred = self._predicates.get(ruleIndex, None) + if pred is None: + raise Exception("No predicate with index:" + str(ruleIndex)) + else: + return pred(localctx, predIndex) + + def expr_sempred(self, localctx:ExprContext, predIndex:int): + if predIndex == 0: + return self.precpred(self._ctx, 16) + + + if predIndex == 1: + return self.precpred(self._ctx, 15) + + + if predIndex == 2: + return self.precpred(self._ctx, 14) + + + if predIndex == 3: + return self.precpred(self._ctx, 3) + + + if predIndex == 4: + return self.precpred(self._ctx, 2) + + + + + diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..8314b2f546c0a18a8e281768b60d66556c852e3b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py @@ -0,0 +1,86 @@ +import os +import subprocess +import glob + +from sympy.utilities.misc import debug + +here = os.path.dirname(__file__) +grammar_file = os.path.abspath(os.path.join(here, "Autolev.g4")) +dir_autolev_antlr = os.path.join(here, "_antlr") + +header = '''\ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +''' + + +def check_antlr_version(): + debug("Checking antlr4 version...") + + try: + debug(subprocess.check_output(["antlr4"]) + .decode('utf-8').split("\n")[0]) + return True + except (subprocess.CalledProcessError, FileNotFoundError): + debug("The 'antlr4' command line tool is not installed, " + "or not on your PATH.\n" + "> Please refer to the README.md file for more information.") + return False + + +def build_parser(output_dir=dir_autolev_antlr): + check_antlr_version() + + debug("Updating ANTLR-generated code in {}".format(output_dir)) + + if not os.path.exists(output_dir): + os.makedirs(output_dir) + + with open(os.path.join(output_dir, "__init__.py"), "w+") as fp: + fp.write(header) + + args = [ + "antlr4", + grammar_file, + "-o", output_dir, + "-no-visitor", + ] + + debug("Running code generation...\n\t$ {}".format(" ".join(args))) + subprocess.check_output(args, cwd=output_dir) + + debug("Applying headers, removing unnecessary files and renaming...") + # Handle case insensitive file systems. If the files are already + # generated, they will be written to autolev* but Autolev*.* won't match them. + for path in (glob.glob(os.path.join(output_dir, "Autolev*.*")) or + glob.glob(os.path.join(output_dir, "autolev*.*"))): + + # Remove files ending in .interp or .tokens as they are not needed. + if not path.endswith(".py"): + os.unlink(path) + continue + + new_path = os.path.join(output_dir, os.path.basename(path).lower()) + with open(path, 'r') as f: + lines = [line.rstrip().replace('AutolevParser import', 'autolevparser import') +'\n' + for line in f] + + os.unlink(path) + + with open(new_path, "w") as out_file: + offset = 0 + while lines[offset].startswith('#'): + offset += 1 + out_file.write(header) + out_file.writelines(lines[offset:]) + + debug("\t{}".format(new_path)) + + return True + + +if __name__ == "__main__": + build_parser() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..9ca2f8af88de18036b90788fd29d02707f098213 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py @@ -0,0 +1,2083 @@ +import collections +import warnings + +from sympy.external import import_module + +autolevparser = import_module('sympy.parsing.autolev._antlr.autolevparser', + import_kwargs={'fromlist': ['AutolevParser']}) +autolevlexer = import_module('sympy.parsing.autolev._antlr.autolevlexer', + import_kwargs={'fromlist': ['AutolevLexer']}) +autolevlistener = import_module('sympy.parsing.autolev._antlr.autolevlistener', + import_kwargs={'fromlist': ['AutolevListener']}) + +AutolevParser = getattr(autolevparser, 'AutolevParser', None) +AutolevLexer = getattr(autolevlexer, 'AutolevLexer', None) +AutolevListener = getattr(autolevlistener, 'AutolevListener', None) + + +def strfunc(z): + if z == 0: + return "" + elif z == 1: + return "_d" + else: + return "_" + "d" * z + +def declare_phy_entities(self, ctx, phy_type, i, j=None): + if phy_type in ("frame", "newtonian"): + declare_frames(self, ctx, i, j) + elif phy_type == "particle": + declare_particles(self, ctx, i, j) + elif phy_type == "point": + declare_points(self, ctx, i, j) + elif phy_type == "bodies": + declare_bodies(self, ctx, i, j) + +def declare_frames(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + name2 = "frame_" + name1 + if self.getValue(ctx.parentCtx.varType()) == "newtonian": + self.newtonian = name2 + + self.symbol_table2.update({name1: name2}) + + self.symbol_table.update({name1 + "1>": name2 + ".x"}) + self.symbol_table.update({name1 + "2>": name2 + ".y"}) + self.symbol_table.update({name1 + "3>": name2 + ".z"}) + + self.type2.update({name1: "frame"}) + self.write(name2 + " = " + "_me.ReferenceFrame('" + name1 + "')\n") + +def declare_points(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "point_" + name1 + + self.symbol_table2.update({name1: name2}) + self.type2.update({name1: "point"}) + self.write(name2 + " = " + "_me.Point('" + name1 + "')\n") + +def declare_particles(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "particle_" + name1 + + self.symbol_table2.update({name1: name2}) + self.type2.update({name1: "particle"}) + self.bodies.update({name1: name2}) + self.write(name2 + " = " + "_me.Particle('" + name1 + "', " + "_me.Point('" + + name1 + "_pt" + "'), " + "_sm.Symbol('m'))\n") + +def declare_bodies(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "body_" + name1 + self.bodies.update({name1: name2}) + masscenter = name2 + "_cm" + refFrame = name2 + "_f" + + self.symbol_table2.update({name1: name2}) + self.symbol_table2.update({name1 + "o": masscenter}) + self.symbol_table.update({name1 + "1>": refFrame+".x"}) + self.symbol_table.update({name1 + "2>": refFrame+".y"}) + self.symbol_table.update({name1 + "3>": refFrame+".z"}) + + self.type2.update({name1: "bodies"}) + self.type2.update({name1+"o": "point"}) + + self.write(masscenter + " = " + "_me.Point('" + name1 + "_cm" + "')\n") + if self.newtonian: + self.write(masscenter + ".set_vel(" + self.newtonian + ", " + "0)\n") + self.write(refFrame + " = " + "_me.ReferenceFrame('" + name1 + "_f" + "')\n") + # We set a dummy mass and inertia here. + # They will be reset using the setters later in the code anyway. + self.write(name2 + " = " + "_me.RigidBody('" + name1 + "', " + masscenter + ", " + + refFrame + ", " + "_sm.symbols('m'), (_me.outer(" + refFrame + + ".x," + refFrame + ".x)," + masscenter + "))\n") + +def inertia_func(self, v1, v2, l, frame): + + if self.type2[v1] == "particle": + l.append("_me.inertia_of_point_mass(" + self.bodies[v1] + ".mass, " + self.bodies[v1] + + ".point.pos_from(" + self.symbol_table2[v2] + "), " + frame + ")") + + elif self.type2[v1] == "bodies": + # Inertia has been defined about center of mass. + if self.inertia_point[v1] == v1 + "o": + # Asking point is cm as well + if v2 == self.inertia_point[v1]: + l.append(self.symbol_table2[v1] + ".inertia[0]") + + # Asking point is not cm + else: + l.append(self.bodies[v1] + ".inertia[0]" + " + " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[v2] + + "), " + frame + ")") + + # Inertia has been defined about another point + else: + # Asking point is the defined point + if v2 == self.inertia_point[v1]: + l.append(self.symbol_table2[v1] + ".inertia[0]") + # Asking point is cm + elif v2 == v1 + "o": + l.append(self.bodies[v1] + ".inertia[0]" + " - " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[self.inertia_point[v1]] + + "), " + frame + ")") + # Asking point is some other point + else: + l.append(self.bodies[v1] + ".inertia[0]" + " - " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[self.inertia_point[v1]] + + "), " + frame + ")" + " + " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[v2] + + "), " + frame + ")") + + +def processConstants(self, ctx): + # Process constant declarations of the type: Constants F = 3, g = 9.81 + name = ctx.ID().getText().lower() + if "=" in ctx.getText(): + self.symbol_table.update({name: name}) + # self.inputs.update({self.symbol_table[name]: self.getValue(ctx.getChild(2))}) + self.write(self.symbol_table[name] + " = " + "_sm.S(" + self.getValue(ctx.getChild(2)) + ")\n") + self.type.update({name: "constants"}) + return + + # Constants declarations of the type: Constants A, B + else: + if "{" not in ctx.getText(): + self.symbol_table[name] = name + self.type[name] = "constants" + + # Process constant declarations of the type: Constants C+, D- + if ctx.getChildCount() == 2: + # This is set for declaring nonpositive=True and nonnegative=True + if ctx.getChild(1).getText() == "+": + self.sign[name] = "+" + elif ctx.getChild(1).getText() == "-": + self.sign[name] = "-" + else: + if "{" not in ctx.getText(): + self.sign[name] = "o" + + # Process constant declarations of the type: Constants K{4}, a{1:2, 1:2}, b{1:2} + if "{" in ctx.getText(): + if ":" in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + + if ":" in ctx.getText(): + if "," in ctx.getText(): + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + for i in range(num1, num2): + for j in range(num3, num4): + self.symbol_table[name + str(i) + str(j)] = name + str(i) + str(j) + self.type[name + str(i) + str(j)] = "constants" + self.var_list.append(name + str(i) + str(j)) + self.sign[name + str(i) + str(j)] = "o" + else: + for i in range(num1, num2): + self.symbol_table[name + str(i)] = name + str(i) + self.type[name + str(i)] = "constants" + self.var_list.append(name + str(i)) + self.sign[name + str(i)] = "o" + + elif "," in ctx.getText(): + for i in range(1, int(ctx.INT(0).getText()) + 1): + for j in range(1, int(ctx.INT(1).getText()) + 1): + self.symbol_table[name] = name + str(i) + str(j) + self.type[name + str(i) + str(j)] = "constants" + self.var_list.append(name + str(i) + str(j)) + self.sign[name + str(i) + str(j)] = "o" + + else: + for i in range(num1, num2): + self.symbol_table[name + str(i)] = name + str(i) + self.type[name + str(i)] = "constants" + self.var_list.append(name + str(i)) + self.sign[name + str(i)] = "o" + + if "{" not in ctx.getText(): + self.var_list.append(name) + + +def writeConstants(self, ctx): + l1 = list(filter(lambda x: self.sign[x] == "o", self.var_list)) + l2 = list(filter(lambda x: self.sign[x] == "+", self.var_list)) + l3 = list(filter(lambda x: self.sign[x] == "-", self.var_list)) + try: + if self.settings["complex"] == "on": + real = ", real=True" + elif self.settings["complex"] == "off": + real = "" + except Exception: + real = ", real=True" + + if l1: + a = ", ".join(l1) + " = " + "_sm.symbols(" + "'" +\ + " ".join(l1) + "'" + real + ")\n" + self.write(a) + if l2: + a = ", ".join(l2) + " = " + "_sm.symbols(" + "'" +\ + " ".join(l2) + "'" + real + ", nonnegative=True)\n" + self.write(a) + if l3: + a = ", ".join(l3) + " = " + "_sm.symbols(" + "'" + \ + " ".join(l3) + "'" + real + ", nonpositive=True)\n" + self.write(a) + self.var_list = [] + + +def processVariables(self, ctx): + # Specified F = x*N1> + y*N2> + name = ctx.ID().getText().lower() + if "=" in ctx.getText(): + text = name + "'"*(ctx.getChildCount()-3) + self.write(text + " = " + self.getValue(ctx.expr()) + "\n") + return + + # Process variables of the type: Variables qA, qB + if ctx.getChildCount() == 1: + self.symbol_table[name] = name + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name: self.getValue(ctx.parentCtx.getChild(0))}) + + self.var_list.append(name) + self.sign[name] = 0 + + # Process variables of the type: Variables x', y'' + elif "'" in ctx.getText() and "{" not in ctx.getText(): + if ctx.getText().count("'") > self.maxDegree: + self.maxDegree = ctx.getText().count("'") + for i in range(ctx.getChildCount()): + self.sign[name + strfunc(i)] = i + self.symbol_table[name + "'"*i] = name + strfunc(i) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + "'"*i: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + strfunc(i)) + + elif "{" in ctx.getText(): + # Process variables of the type: Variables x{3}, y{2} + + if "'" in ctx.getText(): + dash_count = ctx.getText().count("'") + if dash_count > self.maxDegree: + self.maxDegree = dash_count + + if ":" in ctx.getText(): + # Variables C{1:2, 1:2} + if "," in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + # Variables C{1:2} + else: + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + + # Variables C{1,3} + elif "," in ctx.getText(): + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + num3 = 1 + num4 = int(ctx.INT(1).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + + for i in range(num1, num2): + try: + for j in range(num3, num4): + try: + for z in range(dash_count+1): + self.symbol_table.update({name + str(i) + str(j) + "'"*z: name + str(i) + str(j) + strfunc(z)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + str(j) + "'"*z: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + str(j) + strfunc(z)) + self.sign.update({name + str(i) + str(j) + strfunc(z): z}) + if dash_count > self.maxDegree: + self.maxDegree = dash_count + except Exception: + self.symbol_table.update({name + str(i) + str(j): name + str(i) + str(j)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + str(j): self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + str(j)) + self.sign.update({name + str(i) + str(j): 0}) + except Exception: + try: + for z in range(dash_count+1): + self.symbol_table.update({name + str(i) + "'"*z: name + str(i) + strfunc(z)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + "'"*z: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + strfunc(z)) + self.sign.update({name + str(i) + strfunc(z): z}) + if dash_count > self.maxDegree: + self.maxDegree = dash_count + except Exception: + self.symbol_table.update({name + str(i): name + str(i)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i): self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i)) + self.sign.update({name + str(i): 0}) + +def writeVariables(self, ctx): + #print(self.sign) + #print(self.symbol_table) + if self.var_list: + for i in range(self.maxDegree+1): + if i == 0: + j = "" + t = "" + else: + j = str(i) + t = ", " + l = [] + for k in list(filter(lambda x: self.sign[x] == i, self.var_list)): + if i == 0: + l.append(k) + if i == 1: + l.append(k[:-1]) + if i > 1: + l.append(k[:-2]) + a = ", ".join(list(filter(lambda x: self.sign[x] == i, self.var_list))) + " = " +\ + "_me.dynamicsymbols(" + "'" + " ".join(l) + "'" + t + j + ")\n" + l = [] + self.write(a) + self.maxDegree = 0 + self.var_list = [] + +def processImaginary(self, ctx): + name = ctx.ID().getText().lower() + self.symbol_table[name] = name + self.type[name] = "imaginary" + self.var_list.append(name) + + +def writeImaginary(self, ctx): + a = ", ".join(self.var_list) + " = " + "_sm.symbols(" + "'" + \ + " ".join(self.var_list) + "')\n" + b = ", ".join(self.var_list) + " = " + "_sm.I\n" + self.write(a) + self.write(b) + self.var_list = [] + +if AutolevListener: + class MyListener(AutolevListener): # type: ignore + def __init__(self, include_numeric=False): + # Stores data in tree nodes(tree annotation). Especially useful for expr reconstruction. + self.tree_property = {} + + # Stores the declared variables, constants etc as they are declared in Autolev and SymPy + # {"": ""}. + self.symbol_table = collections.OrderedDict() + + # Similar to symbol_table. Used for storing Physical entities like Frames, Points, + # Particles, Bodies etc + self.symbol_table2 = collections.OrderedDict() + + # Used to store nonpositive, nonnegative etc for constants and number of "'"s (order of diff) + # in variables. + self.sign = {} + + # Simple list used as a store to pass around variables between the 'process' and 'write' + # methods. + self.var_list = [] + + # Stores the type of a declared variable (constants, variables, specifieds etc) + self.type = collections.OrderedDict() + + # Similar to self.type. Used for storing the type of Physical entities like Frames, Points, + # Particles, Bodies etc + self.type2 = collections.OrderedDict() + + # These lists are used to distinguish matrix, numeric and vector expressions. + self.matrix_expr = [] + self.numeric_expr = [] + self.vector_expr = [] + self.fr_expr = [] + + self.output_code = [] + + # Stores the variables and their rhs for substituting upon the Autolev command EXPLICIT. + self.explicit = collections.OrderedDict() + + # Write code to import common dependencies. + self.output_code.append("import sympy.physics.mechanics as _me\n") + self.output_code.append("import sympy as _sm\n") + self.output_code.append("import math as m\n") + self.output_code.append("import numpy as _np\n") + self.output_code.append("\n") + + # Just a store for the max degree variable in a line. + self.maxDegree = 0 + + # Stores the input parameters which are then used for codegen and numerical analysis. + self.inputs = collections.OrderedDict() + # Stores the variables which appear in Output Autolev commands. + self.outputs = [] + # Stores the settings specified by the user. Ex: Complex on/off, Degrees on/off + self.settings = {} + # Boolean which changes the behaviour of some expression reconstruction + # when parsing Input Autolev commands. + self.in_inputs = False + self.in_outputs = False + + # Stores for the physical entities. + self.newtonian = None + self.bodies = collections.OrderedDict() + self.constants = [] + self.forces = collections.OrderedDict() + self.q_ind = [] + self.q_dep = [] + self.u_ind = [] + self.u_dep = [] + self.kd_eqs = [] + self.dependent_variables = [] + self.kd_equivalents = collections.OrderedDict() + self.kd_equivalents2 = collections.OrderedDict() + self.kd_eqs_supplied = None + self.kane_type = "no_args" + self.inertia_point = collections.OrderedDict() + self.kane_parsed = False + self.t = False + + # PyDy ode code will be included only if this flag is set to True. + self.include_numeric = include_numeric + + def write(self, string): + self.output_code.append(string) + + def getValue(self, node): + return self.tree_property[node] + + def setValue(self, node, value): + self.tree_property[node] = value + + def getSymbolTable(self): + return self.symbol_table + + def getType(self): + return self.type + + def exitVarDecl(self, ctx): + # This event method handles variable declarations. The parse tree node varDecl contains + # one or more varDecl2 nodes. Eg varDecl for 'Constants a{1:2, 1:2}, b{1:2}' has two varDecl2 + # nodes(one for a{1:2, 1:2} and one for b{1:2}). + + # Variable declarations are processed and stored in the event method exitVarDecl2. + # This stored information is used to write the final SymPy output code in the exitVarDecl event method. + + # determine the type of declaration + if self.getValue(ctx.varType()) == "constant": + writeConstants(self, ctx) + elif self.getValue(ctx.varType()) in\ + ("variable", "motionvariable", "motionvariable'", "specified"): + writeVariables(self, ctx) + elif self.getValue(ctx.varType()) == "imaginary": + writeImaginary(self, ctx) + + def exitVarType(self, ctx): + # Annotate the varType tree node with the type of the variable declaration. + name = ctx.getChild(0).getText().lower() + if name[-1] == "s" and name != "bodies": + self.setValue(ctx, name[:-1]) + else: + self.setValue(ctx, name) + + def exitVarDecl2(self, ctx): + # Variable declarations are processed and stored in the event method exitVarDecl2. + # This stored information is used to write the final SymPy output code in the exitVarDecl event method. + # This is the case for constants, variables, specifieds etc. + + # This isn't the case for all types of declarations though. For instance + # Frames A, B, C, N cannot be defined on one line in SymPy. So we do not append A, B, C, N + # to a var_list or use exitVarDecl. exitVarDecl2 directly writes out to the file. + + # determine the type of declaration + if self.getValue(ctx.parentCtx.varType()) == "constant": + processConstants(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) in \ + ("variable", "motionvariable", "motionvariable'", "specified"): + processVariables(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) == "imaginary": + processImaginary(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) in ("frame", "newtonian", "point", "particle", "bodies"): + if "{" in ctx.getText(): + if ":" in ctx.getText() and "," not in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + elif ":" not in ctx.getText() and "," in ctx.getText(): + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + num3 = 1 + num4 = int(ctx.INT(1).getText()) + 1 + elif ":" in ctx.getText() and "," in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + else: + num1 = 1 + num2 = 2 + for i in range(num1, num2): + try: + for j in range(num3, num4): + declare_phy_entities(self, ctx, self.getValue(ctx.parentCtx.varType()), i, j) + except Exception: + declare_phy_entities(self, ctx, self.getValue(ctx.parentCtx.varType()), i) + # ================== Subrules of parser rule expr (Start) ====================== # + + def exitId(self, ctx): + # Tree annotation for ID which is a labeled subrule of the parser rule expr. + # A_C + python_keywords = ["and", "as", "assert", "break", "class", "continue", "def", "del", "elif", "else", "except",\ + "exec", "finally", "for", "from", "global", "if", "import", "in", "is", "lambda", "not", "or", "pass", "print",\ + "raise", "return", "try", "while", "with", "yield"] + + if ctx.ID().getText().lower() in python_keywords: + warnings.warn("Python keywords must not be used as identifiers. Please refer to the list of keywords at https://docs.python.org/2.5/ref/keywords.html", + SyntaxWarning) + + if "_" in ctx.ID().getText() and ctx.ID().getText().count('_') == 1: + e1, e2 = ctx.ID().getText().lower().split('_') + try: + if self.type2[e1] == "frame": + e1 = self.symbol_table2[e1] + elif self.type2[e1] == "bodies": + e1 = self.symbol_table2[e1] + "_f" + if self.type2[e2] == "frame": + e2 = self.symbol_table2[e2] + elif self.type2[e2] == "bodies": + e2 = self.symbol_table2[e2] + "_f" + + self.setValue(ctx, e1 + ".dcm(" + e2 + ")") + except Exception: + self.setValue(ctx, ctx.ID().getText().lower()) + else: + # Reserved constant Pi + if ctx.ID().getText().lower() == "pi": + self.setValue(ctx, "_sm.pi") + self.numeric_expr.append(ctx) + + # Reserved variable T (for time) + elif ctx.ID().getText().lower() == "t": + self.setValue(ctx, "_me.dynamicsymbols._t") + if not self.in_inputs and not self.in_outputs: + self.t = True + + else: + idText = ctx.ID().getText().lower() + "'"*(ctx.getChildCount() - 1) + if idText in self.type.keys() and self.type[idText] == "matrix": + self.matrix_expr.append(ctx) + if self.in_inputs: + try: + self.setValue(ctx, self.symbol_table[idText]) + except Exception: + self.setValue(ctx, idText.lower()) + else: + try: + self.setValue(ctx, self.symbol_table[idText]) + except Exception: + pass + + def exitInt(self, ctx): + # Tree annotation for int which is a labeled subrule of the parser rule expr. + int_text = ctx.INT().getText() + self.setValue(ctx, int_text) + self.numeric_expr.append(ctx) + + def exitFloat(self, ctx): + # Tree annotation for float which is a labeled subrule of the parser rule expr. + floatText = ctx.FLOAT().getText() + self.setValue(ctx, floatText) + self.numeric_expr.append(ctx) + + def exitAddSub(self, ctx): + # Tree annotation for AddSub which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr (+|-) expr + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + ctx.getChild(1).getText() + + self.getValue(ctx.expr(1))) + + def exitMulDiv(self, ctx): + # Tree annotation for MulDiv which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr (*|/) expr + try: + if ctx.expr(0) in self.vector_expr and ctx.expr(1) in self.vector_expr: + self.setValue(ctx, "_me.outer(" + self.getValue(ctx.expr(0)) + ", " + + self.getValue(ctx.expr(1)) + ")") + else: + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + ctx.getChild(1).getText() + + self.getValue(ctx.expr(1))) + except Exception: + pass + + def exitNegativeOne(self, ctx): + # Tree annotation for negativeOne which is a labeled subrule of the parser rule expr. + self.setValue(ctx, "-1*" + self.getValue(ctx.getChild(1))) + if ctx.getChild(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.getChild(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + + def exitParens(self, ctx): + # Tree annotation for parens which is a labeled subrule of the parser rule expr. + # The subrule is expr = '(' expr ')' + if ctx.expr() in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr() in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr() in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, "(" + self.getValue(ctx.expr()) + ")") + + def exitExponent(self, ctx): + # Tree annotation for Exponent which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr ^ expr + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + "**" + self.getValue(ctx.expr(1))) + + def exitExp(self, ctx): + s = ctx.EXP().getText()[ctx.EXP().getText().index('E')+1:] + if "-" in s: + s = s[0] + s[1:].lstrip("0") + else: + s = s.lstrip("0") + self.setValue(ctx, ctx.EXP().getText()[:ctx.EXP().getText().index('E')] + + "*10**(" + s + ")") + + def exitFunction(self, ctx): + # Tree annotation for function which is a labeled subrule of the parser rule expr. + + # The difference between this and FunctionCall is that this is used for non standalone functions + # appearing in expressions and assignments. + # Eg: + # When we come across a standalone function say Expand(E, n:m) then it is categorized as FunctionCall + # which is a parser rule in itself under rule stat. exitFunctionCall() takes care of it and writes to the file. + # + # On the other hand, while we come across E_diff = D(E, y), we annotate the tree node + # of the function D(E, y) with the SymPy equivalent in exitFunction(). + # In this case it is the method exitAssignment() that writes the code to the file and not exitFunction(). + + ch = ctx.getChild(0) + func_name = ch.getChild(0).getText().lower() + + # Expand(y, n:m) * + if func_name == "expand": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + # _sm.Matrix([i.expand() for i in z]).reshape(z.shape[0], z.shape[1]) + self.setValue(ctx, "_sm.Matrix([i.expand() for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + ")" + "." + "expand()") + + # Factor(y, x) * + elif func_name == "factor": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([_sm.factor(i, " + self.getValue(ch.expr(1)) + ") for i in " + + expr + "])" + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "_sm.factor(" + "(" + expr + ")" + + ", " + self.getValue(ch.expr(1)) + ")") + + # D(y, x) + elif func_name == "d": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.diff(" + self.getValue(ch.expr(1)) + ") for i in " + + expr + "])" + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if ch.getChildCount() == 8: + frame = self.symbol_table2[ch.expr(2).getText().lower()] + self.setValue(ctx, "(" + expr + ")" + "." + "diff(" + self.getValue(ch.expr(1)) + + ", " + frame + ")") + else: + self.setValue(ctx, "(" + expr + ")" + "." + "diff(" + + self.getValue(ch.expr(1)) + ")") + + # Dt(y) + elif func_name == "dt": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.vector_expr: + text = "dt(" + else: + text = "diff(_sm.Symbol('t')" + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i." + text + + ") for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if ch.getChildCount() == 6: + frame = self.symbol_table2[ch.expr(1).getText().lower()] + self.setValue(ctx, "(" + expr + ")" + "." + "dt(" + + frame + ")") + else: + self.setValue(ctx, "(" + expr + ")" + "." + text + ")") + + # Explicit(EXPRESS(IMPLICIT>,C)) + elif func_name == "explicit": + if ch.expr(0) in self.vector_expr: + self.vector_expr.append(ctx) + expr = self.getValue(ch.expr(0)) + if self.explicit.keys(): + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})") + else: + self.setValue(ctx, expr) + + # Taylor(y, 0:2, w=a, x=0) + # TODO: Currently only works with symbols. Make it work for dynamicsymbols. + elif func_name == "taylor": + exp = self.getValue(ch.expr(0)) + order = self.getValue(ch.expr(1).expr(1)) + x = (ch.getChildCount()-6)//2 + l = [] + for i in range(x): + index = 2 + i + child = ch.expr(index) + l.append(".series(" + self.getValue(child.getChild(0)) + + ", " + self.getValue(child.getChild(2)) + + ", " + order + ").removeO()") + self.setValue(ctx, "(" + exp + ")" + "".join(l)) + + # Evaluate(y, a=x, b=2) + elif func_name == "evaluate": + expr = self.getValue(ch.expr(0)) + l = [] + x = (ch.getChildCount()-4)//2 + for i in range(x): + index = 1 + i + child = ch.expr(index) + l.append(self.getValue(child.getChild(0)) + ":" + + self.getValue(child.getChild(2))) + + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.subs({" + ",".join(l) + "}) for i in " + + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if self.explicit: + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ",".join(explicit_list) + + "}).subs({" + ",".join(l) + "})") + else: + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ",".join(l) + "})") + + # Polynomial([a, b, c], x) + elif func_name == "polynomial": + self.setValue(ctx, "_sm.Poly(" + self.getValue(ch.expr(0)) + ", " + + self.getValue(ch.expr(1)) + ")") + + # Roots(Poly, x, 2) + # Roots([1; 2; 3; 4]) + elif func_name == "roots": + self.matrix_expr.append(ctx) + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.setValue(ctx, "[i.evalf() for i in " + "_sm.solve(" + + "_sm.Poly(" + expr + ", " + "x),x)]") + else: + self.setValue(ctx, "[i.evalf() for i in " + "_sm.solve(" + + expr + ", " + self.getValue(ch.expr(1)) + ")]") + + # Transpose(A), Inv(A) + elif func_name in ("transpose", "inv", "inverse"): + self.matrix_expr.append(ctx) + if func_name == "transpose": + e = ".T" + elif func_name in ("inv", "inverse"): + e = "**(-1)" + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + e) + + # Eig(A) + elif func_name == "eig": + # "_sm.Matrix([i.evalf() for i in " + + self.setValue(ctx, "_sm.Matrix([i.evalf() for i in (" + + self.getValue(ch.expr(0)) + ").eigenvals().keys()])") + + # Diagmat(n, m, x) + # Diagmat(3, 1) + elif func_name == "diagmat": + self.matrix_expr.append(ctx) + if ch.getChildCount() == 6: + l = [] + for i in range(int(self.getValue(ch.expr(0)))): + l.append(self.getValue(ch.expr(1)) + ",") + + self.setValue(ctx, "_sm.diag(" + ("".join(l))[:-1] + ")") + + elif ch.getChildCount() == 8: + # _sm.Matrix([x if i==j else 0 for i in range(n) for j in range(m)]).reshape(n, m) + n = self.getValue(ch.expr(0)) + m = self.getValue(ch.expr(1)) + x = self.getValue(ch.expr(2)) + self.setValue(ctx, "_sm.Matrix([" + x + " if i==j else 0 for i in range(" + + n + ") for j in range(" + m + ")]).reshape(" + n + ", " + m + ")") + + # Cols(A) + # Cols(A, 1) + # Cols(A, 1, 2:4, 3) + elif func_name in ("cols", "rows"): + self.matrix_expr.append(ctx) + if func_name == "cols": + e1 = ".cols" + e2 = ".T." + else: + e1 = ".rows" + e2 = "." + if ch.getChildCount() == 4: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + e1) + elif ch.getChildCount() == 6: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + + e1[:-1] + "(" + str(int(self.getValue(ch.expr(1))) - 1) + ")") + else: + l = [] + for i in range(4, ch.getChildCount()): + try: + if ch.getChild(i).getChildCount() > 1 and ch.getChild(i).getChild(1).getText() == ":": + for j in range(int(ch.getChild(i).getChild(0).getText()), + int(ch.getChild(i).getChild(2).getText())+1): + l.append("(" + self.getValue(ch.getChild(2)) + ")" + e2 + + "row(" + str(j-1) + ")") + else: + l.append("(" + self.getValue(ch.getChild(2)) + ")" + e2 + + "row(" + str(int(ch.getChild(i).getText())-1) + ")") + except Exception: + pass + self.setValue(ctx, "_sm.Matrix([" + ",".join(l) + "])") + + # Det(A) Trace(A) + elif func_name in ["det", "trace"]: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + "." + + func_name + "()") + + # Element(A, 2, 3) + elif func_name == "element": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + "[" + + str(int(self.getValue(ch.expr(1)))-1) + "," + + str(int(self.getValue(ch.expr(2)))-1) + "]") + + elif func_name in \ + ["cos", "sin", "tan", "cosh", "sinh", "tanh", "acos", "asin", "atan", + "log", "exp", "sqrt", "factorial", "floor", "sign"]: + self.setValue(ctx, "_sm." + func_name + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "ceil": + self.setValue(ctx, "_sm.ceiling" + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "sqr": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + + ")" + "**2") + + elif func_name == "log10": + self.setValue(ctx, "_sm.log" + + "(" + self.getValue(ch.expr(0)) + ", 10)") + + elif func_name == "atan2": + self.setValue(ctx, "_sm.atan2" + "(" + self.getValue(ch.expr(0)) + ", " + + self.getValue(ch.expr(1)) + ")") + + elif func_name in ["int", "round"]: + self.setValue(ctx, func_name + + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "abs": + self.setValue(ctx, "_sm.Abs(" + self.getValue(ch.expr(0)) + ")") + + elif func_name in ["max", "min"]: + # max(x, y, z) + l = [] + for i in range(1, ch.getChildCount()): + if ch.getChild(i) in self.tree_property.keys(): + l.append(self.getValue(ch.getChild(i))) + elif ch.getChild(i).getText() in [",", "(", ")"]: + l.append(ch.getChild(i).getText()) + self.setValue(ctx, "_sm." + ch.getChild(0).getText().capitalize() + "".join(l)) + + # Coef(y, x) + elif func_name == "coef": + #A41_A53=COEF([RHS(U4);RHS(U5)],[U1,U2,U3]) + if ch.expr(0) in self.matrix_expr and ch.expr(1) in self.matrix_expr: + icount = jcount = 0 + for i in range(ch.expr(0).getChild(0).getChildCount()): + try: + ch.expr(0).getChild(0).getChild(i).getRuleIndex() + icount+=1 + except Exception: + pass + for j in range(ch.expr(1).getChild(0).getChildCount()): + try: + ch.expr(1).getChild(0).getChild(j).getRuleIndex() + jcount+=1 + except Exception: + pass + l = [] + for i in range(icount): + for j in range(jcount): + # a41_a53[i,j] = u4.expand().coeff(u1) + l.append(self.getValue(ch.expr(0).getChild(0).expr(i)) + ".expand().coeff(" + + self.getValue(ch.expr(1).getChild(0).expr(j)) + ")") + self.setValue(ctx, "_sm.Matrix([" + ", ".join(l) + "]).reshape(" + str(icount) + ", " + str(jcount) + ")") + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + + ")" + ".expand().coeff(" + self.getValue(ch.expr(1)) + ")") + + # Exclude(y, x) Include(y, x) + elif func_name in ("exclude", "include"): + if func_name == "exclude": + e = "0" + else: + e = "1" + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.collect(" + self.getValue(ch.expr(1)) + "])" + + ".coeff(" + self.getValue(ch.expr(1)) + "," + e + ")" + "for i in " + expr + ")" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + + ")" + ".collect(" + self.getValue(ch.expr(1)) + ")" + + ".coeff(" + self.getValue(ch.expr(1)) + "," + e + ")") + + # RHS(y) + elif func_name == "rhs": + self.setValue(ctx, self.explicit[self.getValue(ch.expr(0))]) + + # Arrange(y, n, x) * + elif func_name == "arrange": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.collect(" + self.getValue(ch.expr(2)) + + ")" + "for i in " + expr + "])"+ + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + + ")" + ".collect(" + self.getValue(ch.expr(2)) + ")") + + # Replace(y, sin(x)=3) + elif func_name == "replace": + l = [] + for i in range(1, ch.getChildCount()): + try: + if ch.getChild(i).getChild(1).getText() == "=": + l.append(self.getValue(ch.getChild(i).getChild(0)) + + ":" + self.getValue(ch.getChild(i).getChild(2))) + except Exception: + pass + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.subs({" + ",".join(l) + "}) for i in " + + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + + ".subs({" + ",".join(l) + "})") + + # Dot(Loop>, N1>) + elif func_name == "dot": + l = [] + num = (ch.expr(1).getChild(0).getChildCount()-1)//2 + if ch.expr(1) in self.matrix_expr: + for i in range(num): + l.append("_me.dot(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1).getChild(0).expr(i)) + ")") + self.setValue(ctx, "_sm.Matrix([" + ",".join(l) + "]).reshape(" + str(num) + ", " + "1)") + else: + self.setValue(ctx, "_me.dot(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1)) + ")") + # Cross(w_A_N>, P_NA_AB>) + elif func_name == "cross": + self.vector_expr.append(ctx) + self.setValue(ctx, "_me.cross(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1)) + ")") + + # Mag(P_O_Q>) + elif func_name == "mag": + self.setValue(ctx, self.getValue(ch.expr(0)) + "." + "magnitude()") + + # MATRIX(A, I_R>>) + elif func_name == "matrix": + if self.type2[ch.expr(0).getText().lower()] == "frame": + text = "" + elif self.type2[ch.expr(0).getText().lower()] == "bodies": + text = "_f" + self.setValue(ctx, "(" + self.getValue(ch.expr(1)) + ")" + ".to_matrix(" + + self.symbol_table2[ch.expr(0).getText().lower()] + text + ")") + + # VECTOR(A, ROWS(EIGVECS,1)) + elif func_name == "vector": + if self.type2[ch.expr(0).getText().lower()] == "frame": + text = "" + elif self.type2[ch.expr(0).getText().lower()] == "bodies": + text = "_f" + v = self.getValue(ch.expr(1)) + f = self.symbol_table2[ch.expr(0).getText().lower()] + text + self.setValue(ctx, v + "[0]*" + f + ".x +" + v + "[1]*" + f + ".y +" + + v + "[2]*" + f + ".z") + + # Express(A2>, B) + # Here I am dealing with all the Inertia commands as I expect the users to use Inertia + # commands only with Express because SymPy needs the Reference frame to be specified unlike Autolev. + elif func_name == "express": + self.vector_expr.append(ctx) + if self.type2[ch.expr(1).getText().lower()] == "frame": + frame = self.symbol_table2[ch.expr(1).getText().lower()] + else: + frame = self.symbol_table2[ch.expr(1).getText().lower()] + "_f" + if ch.expr(0).getText().lower() == "1>>": + self.setValue(ctx, "_me.inertia(" + frame + ", 1, 1, 1)") + + elif '_' in ch.expr(0).getText().lower() and ch.expr(0).getText().lower().count('_') == 2\ + and ch.expr(0).getText().lower()[0] == "i" and ch.expr(0).getText().lower()[-2:] == ">>": + v1 = ch.expr(0).getText().lower()[:-2].split('_')[1] + v2 = ch.expr(0).getText().lower()[:-2].split('_')[2] + l = [] + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + elif ch.expr(0).getChild(0).getChild(0).getText().lower() == "inertia": + if ch.expr(0).getChild(0).getChildCount() == 4: + l = [] + v2 = ch.expr(0).getChild(0).ID(0).getText().lower() + for v1 in self.bodies: + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + else: + l = [] + l2 = [] + v2 = ch.expr(0).getChild(0).ID(0).getText().lower() + for i in range(1, (ch.expr(0).getChild(0).getChildCount()-2)//2): + l2.append(ch.expr(0).getChild(0).ID(i).getText().lower()) + for v1 in l2: + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + ".express(" + + self.symbol_table2[ch.expr(1).getText().lower()] + ")") + # CM(P) + elif func_name == "cm": + if self.type2[ch.expr(0).getText().lower()] == "point": + text = "" + else: + text = ".point" + if ch.getChildCount() == 4: + self.setValue(ctx, "_me.functions.center_of_mass(" + self.symbol_table2[ch.expr(0).getText().lower()] + + text + "," + ", ".join(self.bodies.values()) + ")") + else: + bodies = [] + for i in range(1, (ch.getChildCount()-1)//2): + bodies.append(self.symbol_table2[ch.expr(i).getText().lower()]) + self.setValue(ctx, "_me.functions.center_of_mass(" + self.symbol_table2[ch.expr(0).getText().lower()] + + text + "," + ", ".join(bodies) + ")") + + # PARTIALS(V_P1_E>,U1) + elif func_name == "partials": + speeds = [] + for i in range(1, (ch.getChildCount()-1)//2): + if self.kd_equivalents2: + speeds.append(self.kd_equivalents2[self.symbol_table[ch.expr(i).getText().lower()]]) + else: + speeds.append(self.symbol_table[ch.expr(i).getText().lower()]) + v1, v2, v3 = ch.expr(0).getText().lower().replace(">","").split('_') + if self.type2[v2] == "point": + point = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + point = self.symbol_table2[v2] + ".point" + frame = self.symbol_table2[v3] + self.setValue(ctx, point + ".partial_velocity(" + frame + ", " + ",".join(speeds) + ")") + + # UnitVec(A1>+A2>+A3>) + elif func_name == "unitvec": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + ".normalize()") + + # Units(deg, rad) + elif func_name == "units": + if ch.expr(0).getText().lower() == "deg" and ch.expr(1).getText().lower() == "rad": + factor = 0.0174533 + elif ch.expr(0).getText().lower() == "rad" and ch.expr(1).getText().lower() == "deg": + factor = 57.2958 + self.setValue(ctx, str(factor)) + # Mass(A) + elif func_name == "mass": + l = [] + try: + ch.ID(0).getText().lower() + for i in range((ch.getChildCount()-1)//2): + l.append(self.symbol_table2[ch.ID(i).getText().lower()] + ".mass") + self.setValue(ctx, "+".join(l)) + except Exception: + for i in self.bodies.keys(): + l.append(self.bodies[i] + ".mass") + self.setValue(ctx, "+".join(l)) + + # Fr() FrStar() + # _me.KanesMethod(n, q_ind, u_ind, kd, velocity_constraints).kanes_equations(pl, fl)[0] + elif func_name in ["fr", "frstar"]: + if not self.kane_parsed: + if self.kd_eqs: + for i in self.kd_eqs: + self.q_ind.append(self.symbol_table[i.strip().split('-')[0].replace("'","")]) + self.u_ind.append(self.symbol_table[i.strip().split('-')[1].replace("'","")]) + + for i in range(len(self.kd_eqs)): + self.kd_eqs[i] = self.symbol_table[self.kd_eqs[i].strip().split('-')[0]] + " - " +\ + self.symbol_table[self.kd_eqs[i].strip().split('-')[1]] + + # Do all of this if kd_eqs are not specified + if not self.kd_eqs: + self.kd_eqs_supplied = False + self.matrix_expr.append(ctx) + for i in self.type.keys(): + if self.type[i] == "motionvariable": + if self.sign[self.symbol_table[i.lower()]] == 0: + self.q_ind.append(self.symbol_table[i.lower()]) + elif self.sign[self.symbol_table[i.lower()]] == 1: + name = "u_" + self.symbol_table[i.lower()] + self.symbol_table.update({name: name}) + self.write(name + " = " + "_me.dynamicsymbols('" + name + "')\n") + if self.symbol_table[i.lower()] not in self.dependent_variables: + self.u_ind.append(name) + self.kd_equivalents.update({name: self.symbol_table[i.lower()]}) + else: + self.u_dep.append(name) + self.kd_equivalents.update({name: self.symbol_table[i.lower()]}) + + for i in self.kd_equivalents.keys(): + self.kd_eqs.append(self.kd_equivalents[i] + "-" + i) + + if not self.u_ind and not self.kd_eqs: + self.u_ind = self.q_ind.copy() + self.q_ind = [] + + # deal with velocity constraints + if self.dependent_variables: + for i in self.dependent_variables: + self.u_dep.append(i) + if i in self.u_ind: + self.u_ind.remove(i) + + + self.u_dep[:] = [i for i in self.u_dep if i not in self.kd_equivalents.values()] + + force_list = [] + for i in self.forces.keys(): + force_list.append("(" + i + "," + self.forces[i] + ")") + if self.u_dep: + u_dep_text = ", u_dependent=[" + ", ".join(self.u_dep) + "]" + else: + u_dep_text = "" + if self.dependent_variables: + velocity_constraints_text = ", velocity_constraints = velocity_constraints" + else: + velocity_constraints_text = "" + if ctx.parentCtx not in self.fr_expr: + self.write("kd_eqs = [" + ", ".join(self.kd_eqs) + "]\n") + self.write("forceList = " + "[" + ", ".join(force_list) + "]\n") + self.write("kane = _me.KanesMethod(" + self.newtonian + ", " + "q_ind=[" + + ",".join(self.q_ind) + "], " + "u_ind=[" + + ", ".join(self.u_ind) + "]" + u_dep_text + ", " + + "kd_eqs = kd_eqs" + velocity_constraints_text + ")\n") + self.write("fr, frstar = kane." + "kanes_equations([" + + ", ".join(self.bodies.values()) + "], forceList)\n") + self.fr_expr.append(ctx.parentCtx) + self.kane_parsed = True + self.setValue(ctx, func_name) + + def exitMatrices(self, ctx): + # Tree annotation for Matrices which is a labeled subrule of the parser rule expr. + + # MO = [a, b; c, d] + # we generate _sm.Matrix([a, b, c, d]).reshape(2, 2) + # The reshape values are determined by counting the "," and ";" in the Autolev matrix + + # Eg: + # [1, 2, 3; 4, 5, 6; 7, 8, 9; 10, 11, 12] + # semicolon_count = 3 and rows = 3+1 = 4 + # comma_count = 8 and cols = 8/rows + 1 = 8/4 + 1 = 3 + + # TODO** Parse block matrices + self.matrix_expr.append(ctx) + l = [] + semicolon_count = 0 + comma_count = 0 + for i in range(ctx.matrix().getChildCount()): + child = ctx.matrix().getChild(i) + if child == AutolevParser.ExprContext: + l.append(self.getValue(child)) + elif child.getText() == ";": + semicolon_count += 1 + l.append(",") + elif child.getText() == ",": + comma_count += 1 + l.append(",") + else: + try: + try: + l.append(self.getValue(child)) + except Exception: + l.append(self.symbol_table[child.getText().lower()]) + except Exception: + l.append(child.getText().lower()) + num_of_rows = semicolon_count + 1 + num_of_cols = (comma_count//num_of_rows) + 1 + + self.setValue(ctx, "_sm.Matrix(" + "".join(l) + ")" + ".reshape(" + + str(num_of_rows) + ", " + str(num_of_cols) + ")") + + def exitVectorOrDyadic(self, ctx): + self.vector_expr.append(ctx) + ch = ctx.vec() + + if ch.getChild(0).getText() == "0>": + self.setValue(ctx, "0") + + elif ch.getChild(0).getText() == "1>>": + self.setValue(ctx, "1>>") + + elif "_" in ch.ID().getText() and ch.ID().getText().count('_') == 2: + vec_text = ch.getText().lower() + v1, v2, v3 = ch.ID().getText().lower().split('_') + + if v1 == "p": + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + if self.type2[v3] == "point": + e3 = self.symbol_table2[v3] + elif self.type2[v3] == "particle": + e3 = self.symbol_table2[v3] + ".point" + get_vec = e3 + ".pos_from(" + e2 + ")" + self.setValue(ctx, get_vec) + + elif v1 in ("w", "alf"): + if v1 == "w": + text = ".ang_vel_in(" + elif v1 == "alf": + text = ".ang_acc_in(" + if self.type2[v2] == "bodies": + e2 = self.symbol_table2[v2] + "_f" + elif self.type2[v2] == "frame": + e2 = self.symbol_table2[v2] + if self.type2[v3] == "bodies": + e3 = self.symbol_table2[v3] + "_f" + elif self.type2[v3] == "frame": + e3 = self.symbol_table2[v3] + get_vec = e2 + text + e3 + ")" + self.setValue(ctx, get_vec) + + elif v1 in ("v", "a"): + if v1 == "v": + text = ".vel(" + elif v1 == "a": + text = ".acc(" + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + get_vec = e2 + text + self.symbol_table2[v3] + ")" + self.setValue(ctx, get_vec) + + else: + self.setValue(ctx, vec_text.replace(">", "")) + + else: + vec_text = ch.getText().lower() + name = self.symbol_table[vec_text] + self.setValue(ctx, name) + + def exitIndexing(self, ctx): + if ctx.getChildCount() == 4: + try: + int_text = str(int(self.getValue(ctx.getChild(2))) - 1) + except Exception: + int_text = self.getValue(ctx.getChild(2)) + " - 1" + self.setValue(ctx, ctx.ID().getText().lower() + "[" + int_text + "]") + elif ctx.getChildCount() == 6: + try: + int_text1 = str(int(self.getValue(ctx.getChild(2))) - 1) + except Exception: + int_text1 = self.getValue(ctx.getChild(2)) + " - 1" + try: + int_text2 = str(int(self.getValue(ctx.getChild(4))) - 1) + except Exception: + int_text2 = self.getValue(ctx.getChild(2)) + " - 1" + self.setValue(ctx, ctx.ID().getText().lower() + "[" + int_text1 + ", " + int_text2 + "]") + + + # ================== Subrules of parser rule expr (End) ====================== # + + def exitRegularAssign(self, ctx): + # Handle assignments of type ID = expr + if ctx.equals().getText() in ["=", "+=", "-=", "*=", "/="]: + equals = ctx.equals().getText() + elif ctx.equals().getText() == ":=": + equals = " = " + elif ctx.equals().getText() == "^=": + equals = "**=" + + try: + a = ctx.ID().getText().lower() + "'"*ctx.diff().getText().count("'") + except Exception: + a = ctx.ID().getText().lower() + + if a in self.type.keys() and self.type[a] in ("motionvariable", "motionvariable'") and\ + self.type[ctx.expr().getText().lower()] in ("motionvariable", "motionvariable'"): + b = ctx.expr().getText().lower() + if "'" in b and "'" not in a: + a, b = b, a + if not self.kane_parsed: + self.kd_eqs.append(a + "-" + b) + self.kd_equivalents.update({self.symbol_table[a]: + self.symbol_table[b]}) + self.kd_equivalents2.update({self.symbol_table[b]: + self.symbol_table[a]}) + + if a in self.symbol_table.keys() and a in self.type.keys() and self.type[a] in ("variable", "motionvariable"): + self.explicit.update({self.symbol_table[a]: self.getValue(ctx.expr())}) + + else: + if ctx.expr() in self.matrix_expr: + self.type.update({a: "matrix"}) + + try: + b = self.symbol_table[a] + except KeyError: + self.symbol_table[a] = a + + if "_" in a and a.count("_") == 1: + e1, e2 = a.split('_') + if e1 in self.type2.keys() and self.type2[e1] in ("frame", "bodies")\ + and e2 in self.type2.keys() and self.type2[e2] in ("frame", "bodies"): + if self.type2[e1] == "bodies": + t1 = "_f" + else: + t1 = "" + if self.type2[e2] == "bodies": + t2 = "_f" + else: + t2 = "" + + self.write(self.symbol_table2[e2] + t2 + ".orient(" + self.symbol_table2[e1] + + t1 + ", 'DCM', " + self.getValue(ctx.expr()) + ")\n") + else: + self.write(self.symbol_table[a] + " " + equals + " " + + self.getValue(ctx.expr()) + "\n") + else: + self.write(self.symbol_table[a] + " " + equals + " " + + self.getValue(ctx.expr()) + "\n") + + def exitIndexAssign(self, ctx): + # Handle assignments of type ID[index] = expr + if ctx.equals().getText() in ["=", "+=", "-=", "*=", "/="]: + equals = ctx.equals().getText() + elif ctx.equals().getText() == ":=": + equals = " = " + elif ctx.equals().getText() == "^=": + equals = "**=" + + text = ctx.ID().getText().lower() + self.type.update({text: "matrix"}) + # Handle assignments of type ID[2] = expr + if ctx.index().getChildCount() == 1: + if ctx.index().getChild(0).getText() == "1": + self.type.update({text: "matrix"}) + self.symbol_table.update({text: text}) + self.write(text + " = " + "_sm.Matrix([[0]])\n") + self.write(text + "[0] = " + self.getValue(ctx.expr()) + "\n") + else: + # m = m.row_insert(m.shape[0], _sm.Matrix([[0]])) + self.write(text + " = " + text + + ".row_insert(" + text + ".shape[0]" + ", " + "_sm.Matrix([[0]])" + ")\n") + self.write(text + "[" + text + ".shape[0]-1" + "] = " + self.getValue(ctx.expr()) + "\n") + + # Handle assignments of type ID[2, 2] = expr + elif ctx.index().getChildCount() == 3: + l = [] + try: + l.append(str(int(self.getValue(ctx.index().getChild(0)))-1)) + except Exception: + l.append(self.getValue(ctx.index().getChild(0)) + "-1") + l.append(",") + try: + l.append(str(int(self.getValue(ctx.index().getChild(2)))-1)) + except Exception: + l.append(self.getValue(ctx.index().getChild(2)) + "-1") + self.write(self.symbol_table[ctx.ID().getText().lower()] + + "[" + "".join(l) + "]" + " " + equals + " " + self.getValue(ctx.expr()) + "\n") + + def exitVecAssign(self, ctx): + # Handle assignments of the type vec = expr + ch = ctx.vec() + vec_text = ch.getText().lower() + + if "_" in ch.ID().getText(): + num = ch.ID().getText().count('_') + + if num == 2: + v1, v2, v3 = ch.ID().getText().lower().split('_') + + if v1 == "p": + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + if self.type2[v3] == "point": + e3 = self.symbol_table2[v3] + elif self.type2[v3] == "particle": + e3 = self.symbol_table2[v3] + ".point" + # ab.set_pos(na, la*a.x) + self.write(e3 + ".set_pos(" + e2 + ", " + self.getValue(ctx.expr()) + ")\n") + + elif v1 in ("w", "alf"): + if v1 == "w": + text = ".set_ang_vel(" + elif v1 == "alf": + text = ".set_ang_acc(" + # a.set_ang_vel(n, qad*a.z) + if self.type2[v2] == "bodies": + e2 = self.symbol_table2[v2] + "_f" + else: + e2 = self.symbol_table2[v2] + if self.type2[v3] == "bodies": + e3 = self.symbol_table2[v3] + "_f" + else: + e3 = self.symbol_table2[v3] + self.write(e2 + text + e3 + ", " + self.getValue(ctx.expr()) + ")\n") + + elif v1 in ("v", "a"): + if v1 == "v": + text = ".set_vel(" + elif v1 == "a": + text = ".set_acc(" + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + self.write(e2 + text + self.symbol_table2[v3] + + ", " + self.getValue(ctx.expr()) + ")\n") + elif v1 == "i": + if v2 in self.type2.keys() and self.type2[v2] == "bodies": + self.write(self.symbol_table2[v2] + ".inertia = (" + self.getValue(ctx.expr()) + + ", " + self.symbol_table2[v3] + ")\n") + self.inertia_point.update({v2: v3}) + elif v2 in self.type2.keys() and self.type2[v2] == "particle": + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + + elif num == 1: + v1, v2 = ch.ID().getText().lower().split('_') + + if v1 in ("force", "torque"): + if self.type2[v2] in ("point", "frame"): + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + self.symbol_table.update({vec_text: ch.ID().getText().lower()}) + + if e2 in self.forces.keys(): + self.forces[e2] = self.forces[e2] + " + " + self.getValue(ctx.expr()) + else: + self.forces.update({e2: self.getValue(ctx.expr())}) + self.write(ch.ID().getText().lower() + " = " + self.forces[e2] + "\n") + + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(name + " " + ctx.getChild(1).getText() + " " + self.getValue(ctx.expr()) + "\n") + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(name + " " + ctx.getChild(1).getText() + " " + self.getValue(ctx.expr()) + "\n") + + def enterInputs2(self, ctx): + self.in_inputs = True + + # Inputs + def exitInputs2(self, ctx): + # Stores numerical values given by the input command which + # are used for codegen and numerical analysis. + if ctx.getChildCount() == 3: + try: + self.inputs.update({self.symbol_table[ctx.id_diff().getText().lower()]: self.getValue(ctx.expr(0))}) + except Exception: + self.inputs.update({ctx.id_diff().getText().lower(): self.getValue(ctx.expr(0))}) + elif ctx.getChildCount() == 4: + try: + self.inputs.update({self.symbol_table[ctx.id_diff().getText().lower()]: + (self.getValue(ctx.expr(0)), self.getValue(ctx.expr(1)))}) + except Exception: + self.inputs.update({ctx.id_diff().getText().lower(): + (self.getValue(ctx.expr(0)), self.getValue(ctx.expr(1)))}) + + self.in_inputs = False + + def enterOutputs(self, ctx): + self.in_outputs = True + def exitOutputs(self, ctx): + self.in_outputs = False + + def exitOutputs2(self, ctx): + try: + if "[" in ctx.expr(1).getText(): + self.outputs.append(self.symbol_table[ctx.expr(0).getText().lower()] + + ctx.expr(1).getText().lower()) + else: + self.outputs.append(self.symbol_table[ctx.expr(0).getText().lower()]) + + except Exception: + pass + + # Code commands + def exitCodegen(self, ctx): + # Handles the CODE() command ie the solvers and the codgen part. + # Uses linsolve for the algebraic solvers and nsolve for non linear solvers. + + if ctx.functionCall().getChild(0).getText().lower() == "algebraic": + matrix_name = self.getValue(ctx.functionCall().expr(0)) + e = [] + d = [] + for i in range(1, (ctx.functionCall().getChildCount()-2)//2): + a = self.getValue(ctx.functionCall().expr(i)) + e.append(a) + + for i in self.inputs.keys(): + d.append(i + ":" + self.inputs[i]) + self.write(matrix_name + "_list" + " = " + "[]\n") + self.write("for i in " + matrix_name + ": " + matrix_name + + "_list" + ".append(i.subs({" + ", ".join(d) + "}))\n") + self.write("print(_sm.linsolve(" + matrix_name + "_list" + ", " + ",".join(e) + "))\n") + + elif ctx.functionCall().getChild(0).getText().lower() == "nonlinear": + e = [] + d = [] + guess = [] + for i in range(1, (ctx.functionCall().getChildCount()-2)//2): + a = self.getValue(ctx.functionCall().expr(i)) + e.append(a) + #print(self.inputs) + for i in self.inputs.keys(): + if i in self.symbol_table.keys(): + if type(self.inputs[i]) is tuple: + j, z = self.inputs[i] + else: + j = self.inputs[i] + z = "" + if i not in e: + if z == "deg": + d.append(i + ":" + "_np.deg2rad(" + j + ")") + else: + d.append(i + ":" + j) + else: + if z == "deg": + guess.append("_np.deg2rad(" + j + ")") + else: + guess.append(j) + + self.write("matrix_list" + " = " + "[]\n") + self.write("for i in " + self.getValue(ctx.functionCall().expr(0)) + ":") + self.write("matrix_list" + ".append(i.subs({" + ", ".join(d) + "}))\n") + self.write("print(_sm.nsolve(matrix_list," + "(" + ",".join(e) + ")" + + ",(" + ",".join(guess) + ")" + "))\n") + + elif ctx.functionCall().getChild(0).getText().lower() in ["ode", "dynamics"] and self.include_numeric: + if self.kane_type == "no_args": + for i in self.symbol_table.keys(): + try: + if self.type[i] == "constants" or self.type[self.symbol_table[i]] == "constants": + self.constants.append(self.symbol_table[i]) + except Exception: + pass + q_add_u = self.q_ind + self.q_dep + self.u_ind + self.u_dep + x0 = [] + for i in q_add_u: + try: + if i in self.inputs.keys(): + if type(self.inputs[i]) is tuple: + if self.inputs[i][1] == "deg": + x0.append(i + ":" + "_np.deg2rad(" + self.inputs[i][0] + ")") + else: + x0.append(i + ":" + self.inputs[i][0]) + else: + x0.append(i + ":" + self.inputs[i]) + elif self.kd_equivalents[i] in self.inputs.keys(): + if type(self.inputs[self.kd_equivalents[i]]) is tuple: + x0.append(i + ":" + self.inputs[self.kd_equivalents[i]][0]) + else: + x0.append(i + ":" + self.inputs[self.kd_equivalents[i]]) + except Exception: + pass + + # numerical constants + numerical_constants = [] + for i in self.constants: + if i in self.inputs.keys(): + if type(self.inputs[i]) is tuple: + numerical_constants.append(self.inputs[i][0]) + else: + numerical_constants.append(self.inputs[i]) + + # t = linspace + t_final = self.inputs["tfinal"] + integ_stp = self.inputs["integstp"] + + self.write("from pydy.system import System\n") + const_list = [] + if numerical_constants: + for i in range(len(self.constants)): + const_list.append(self.constants[i] + ":" + numerical_constants[i]) + specifieds = [] + if self.t: + specifieds.append("_me.dynamicsymbols('t')" + ":" + "lambda x, t: t") + + for i in self.inputs: + if i in self.symbol_table.keys() and self.symbol_table[i] not in\ + self.constants + self.q_ind + self.q_dep + self.u_ind + self.u_dep: + specifieds.append(self.symbol_table[i] + ":" + self.inputs[i]) + + self.write("sys = System(kane, constants = {" + ", ".join(const_list) + "},\n" + + "specifieds={" + ", ".join(specifieds) + "},\n" + + "initial_conditions={" + ", ".join(x0) + "},\n" + + "times = _np.linspace(0.0, " + str(t_final) + ", " + str(t_final) + + "/" + str(integ_stp) + "))\n\ny=sys.integrate()\n") + + # For outputs other than qs and us. + other_outputs = [] + for i in self.outputs: + if i not in q_add_u: + if "[" in i: + other_outputs.append((i[:-3] + i[-2], i[:-3] + "[" + str(int(i[-2])-1) + "]")) + else: + other_outputs.append((i, i)) + + for i in other_outputs: + self.write(i[0] + "_out" + " = " + "[]\n") + if other_outputs: + self.write("for i in y:\n") + self.write(" q_u_dict = dict(zip(sys.coordinates+sys.speeds, i))\n") + for i in other_outputs: + self.write(" "*4 + i[0] + "_out" + ".append(" + i[1] + ".subs(q_u_dict)" + + ".subs(sys.constants).evalf())\n") + + # Standalone function calls (used for dual functions) + def exitFunctionCall(self, ctx): + # Basically deals with standalone function calls ie functions which are not a part of + # expressions and assignments. Autolev Dual functions can both appear in standalone + # function calls and also on the right hand side as part of expr or assignment. + + # Dual functions are indicated by a * in the comments below + + # Checks if the function is a statement on its own + if ctx.parentCtx.getRuleIndex() == AutolevParser.RULE_stat: + func_name = ctx.getChild(0).getText().lower() + # Expand(E, n:m) * + if func_name == "expand": + # If the first argument is a pre declared variable. + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([i.expand() for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(symbol + " = " + symbol + "." + "expand()\n") + + # Factor(E, x) * + elif func_name == "factor": + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([_sm.factor(i," + self.getValue(ctx.expr(1)) + + ") for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(expr + " = " + "_sm.factor(" + expr + ", " + + self.getValue(ctx.expr(1)) + ")\n") + + # Solve(Zero, x, y) + elif func_name == "solve": + l = [] + l2 = [] + num = 0 + for i in range(1, ctx.getChildCount()): + if ctx.getChild(i).getText() == ",": + num+=1 + try: + l.append(self.getValue(ctx.getChild(i))) + except Exception: + l.append(ctx.getChild(i).getText()) + + if i != 2: + try: + l2.append(self.getValue(ctx.getChild(i))) + except Exception: + pass + + for i in l2: + self.explicit.update({i: "_sm.solve" + "".join(l) + "[" + i + "]"}) + + self.write("print(_sm.solve" + "".join(l) + ")\n") + + # Arrange(y, n, x) * + elif func_name == "arrange": + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([i.collect(" + self.getValue(ctx.expr(2)) + + ")" + "for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(self.getValue(ctx.expr(0)) + ".collect(" + + self.getValue(ctx.expr(2)) + ")\n") + + # Eig(M, EigenValue, EigenVec) + elif func_name == "eig": + self.symbol_table.update({ctx.expr(1).getText().lower(): ctx.expr(1).getText().lower()}) + self.symbol_table.update({ctx.expr(2).getText().lower(): ctx.expr(2).getText().lower()}) + # _sm.Matrix([i.evalf() for i in (i_s_so).eigenvals().keys()]) + self.write(ctx.expr(1).getText().lower() + " = " + + "_sm.Matrix([i.evalf() for i in " + + "(" + self.getValue(ctx.expr(0)) + ")" + ".eigenvals().keys()])\n") + # _sm.Matrix([i[2][0].evalf() for i in (i_s_o).eigenvects()]).reshape(i_s_o.shape[0], i_s_o.shape[1]) + self.write(ctx.expr(2).getText().lower() + " = " + + "_sm.Matrix([i[2][0].evalf() for i in " + "(" + self.getValue(ctx.expr(0)) + ")" + + ".eigenvects()]).reshape(" + self.getValue(ctx.expr(0)) + ".shape[0], " + + self.getValue(ctx.expr(0)) + ".shape[1])\n") + + # Simprot(N, A, 3, qA) + elif func_name == "simprot": + # A.orient(N, 'Axis', qA, N.z) + if self.type2[ctx.expr(0).getText().lower()] == "frame": + frame1 = self.symbol_table2[ctx.expr(0).getText().lower()] + elif self.type2[ctx.expr(0).getText().lower()] == "bodies": + frame1 = self.symbol_table2[ctx.expr(0).getText().lower()] + "_f" + if self.type2[ctx.expr(1).getText().lower()] == "frame": + frame2 = self.symbol_table2[ctx.expr(1).getText().lower()] + elif self.type2[ctx.expr(1).getText().lower()] == "bodies": + frame2 = self.symbol_table2[ctx.expr(1).getText().lower()] + "_f" + e2 = "" + if ctx.expr(2).getText()[0] == "-": + e2 = "-1*" + if ctx.expr(2).getText() in ("1", "-1"): + e = frame1 + ".x" + elif ctx.expr(2).getText() in ("2", "-2"): + e = frame1 + ".y" + elif ctx.expr(2).getText() in ("3", "-3"): + e = frame1 + ".z" + else: + e = self.getValue(ctx.expr(2)) + e2 = "" + + if "degrees" in self.settings.keys() and self.settings["degrees"] == "off": + value = self.getValue(ctx.expr(3)) + else: + if ctx.expr(3) in self.numeric_expr: + value = "_np.deg2rad(" + self.getValue(ctx.expr(3)) + ")" + else: + value = self.getValue(ctx.expr(3)) + self.write(frame2 + ".orient(" + frame1 + + ", " + "'Axis'" + ", " + "[" + value + + ", " + e2 + e + "]" + ")\n") + + # Express(A2>, B) * + elif func_name == "express": + if self.type2[ctx.expr(1).getText().lower()] == "bodies": + f = "_f" + else: + f = "" + + if '_' in ctx.expr(0).getText().lower() and ctx.expr(0).getText().count('_') == 2: + vec = ctx.expr(0).getText().lower().replace(">", "").split('_') + v1 = self.symbol_table2[vec[1]] + v2 = self.symbol_table2[vec[2]] + if vec[0] == "p": + self.write(v2 + ".set_pos(" + v1 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + elif vec[0] == "v": + self.write(v1 + ".set_vel(" + v2 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + elif vec[0] == "a": + self.write(v1 + ".set_acc(" + v2 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + else: + self.write(self.getValue(ctx.expr(0)) + " = " + "(" + self.getValue(ctx.expr(0)) + ")" + ".express(" + + self.symbol_table2[ctx.expr(1).getText().lower()] + f + ")\n") + else: + self.write(self.getValue(ctx.expr(0)) + " = " + "(" + self.getValue(ctx.expr(0)) + ")" + ".express(" + + self.symbol_table2[ctx.expr(1).getText().lower()] + f + ")\n") + + # Angvel(A, B) + elif func_name == "angvel": + self.write("print(" + self.symbol_table2[ctx.expr(1).getText().lower()] + + ".ang_vel_in(" + self.symbol_table2[ctx.expr(0).getText().lower()] + "))\n") + + # v2pts(N, A, O, P) + elif func_name in ("v2pts", "a2pts", "v2pt", "a1pt"): + if func_name == "v2pts": + text = ".v2pt_theory(" + elif func_name == "a2pts": + text = ".a2pt_theory(" + elif func_name == "v1pt": + text = ".v1pt_theory(" + elif func_name == "a1pt": + text = ".a1pt_theory(" + if self.type2[ctx.expr(1).getText().lower()] == "frame": + frame = self.symbol_table2[ctx.expr(1).getText().lower()] + elif self.type2[ctx.expr(1).getText().lower()] == "bodies": + frame = self.symbol_table2[ctx.expr(1).getText().lower()] + "_f" + expr_list = [] + for i in range(2, 4): + if self.type2[ctx.expr(i).getText().lower()] == "point": + expr_list.append(self.symbol_table2[ctx.expr(i).getText().lower()]) + elif self.type2[ctx.expr(i).getText().lower()] == "particle": + expr_list.append(self.symbol_table2[ctx.expr(i).getText().lower()] + ".point") + + self.write(expr_list[1] + text + expr_list[0] + + "," + self.symbol_table2[ctx.expr(0).getText().lower()] + "," + + frame + ")\n") + + # Gravity(g*N1>) + elif func_name == "gravity": + for i in self.bodies.keys(): + if self.type2[i] == "bodies": + e = self.symbol_table2[i] + ".masscenter" + elif self.type2[i] == "particle": + e = self.symbol_table2[i] + ".point" + if e in self.forces.keys(): + self.forces[e] = self.forces[e] + self.symbol_table2[i] +\ + ".mass*(" + self.getValue(ctx.expr(0)) + ")" + else: + self.forces.update({e: self.symbol_table2[i] + + ".mass*(" + self.getValue(ctx.expr(0)) + ")"}) + self.write("force_" + i + " = " + self.forces[e] + "\n") + + # Explicit(EXPRESS(IMPLICIT>,C)) + elif func_name == "explicit": + if ctx.expr(0) in self.vector_expr: + self.vector_expr.append(ctx) + expr = self.getValue(ctx.expr(0)) + if self.explicit.keys(): + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + if '_' in ctx.expr(0).getText().lower() and ctx.expr(0).getText().count('_') == 2: + vec = ctx.expr(0).getText().lower().replace(">", "").split('_') + v1 = self.symbol_table2[vec[1]] + v2 = self.symbol_table2[vec[2]] + if vec[0] == "p": + self.write(v2 + ".set_pos(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + elif vec[0] == "v": + self.write(v2 + ".set_vel(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + elif vec[0] == "a": + self.write(v2 + ".set_acc(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + else: + self.write(expr + " = " + "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})\n") + else: + self.write(expr + " = " + "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})\n") + + # Force(O/Q, -k*Stretch*Uvec>) + elif func_name in ("force", "torque"): + + if "/" in ctx.expr(0).getText().lower(): + p1 = ctx.expr(0).getText().lower().split('/')[0] + p2 = ctx.expr(0).getText().lower().split('/')[1] + if self.type2[p1] in ("point", "frame"): + pt1 = self.symbol_table2[p1] + elif self.type2[p1] == "particle": + pt1 = self.symbol_table2[p1] + ".point" + if self.type2[p2] in ("point", "frame"): + pt2 = self.symbol_table2[p2] + elif self.type2[p2] == "particle": + pt2 = self.symbol_table2[p2] + ".point" + if pt1 in self.forces.keys(): + self.forces[pt1] = self.forces[pt1] + " + -1*("+self.getValue(ctx.expr(1)) + ")" + self.write("force_" + p1 + " = " + self.forces[pt1] + "\n") + else: + self.forces.update({pt1: "-1*("+self.getValue(ctx.expr(1)) + ")"}) + self.write("force_" + p1 + " = " + self.forces[pt1] + "\n") + if pt2 in self.forces.keys(): + self.forces[pt2] = self.forces[pt2] + "+ " + self.getValue(ctx.expr(1)) + self.write("force_" + p2 + " = " + self.forces[pt2] + "\n") + else: + self.forces.update({pt2: self.getValue(ctx.expr(1))}) + self.write("force_" + p2 + " = " + self.forces[pt2] + "\n") + + elif ctx.expr(0).getChildCount() == 1: + p1 = ctx.expr(0).getText().lower() + if self.type2[p1] in ("point", "frame"): + pt1 = self.symbol_table2[p1] + elif self.type2[p1] == "particle": + pt1 = self.symbol_table2[p1] + ".point" + if pt1 in self.forces.keys(): + self.forces[pt1] = self.forces[pt1] + "+ -1*(" + self.getValue(ctx.expr(1)) + ")" + else: + self.forces.update({pt1: "-1*(" + self.getValue(ctx.expr(1)) + ")"}) + + # Constrain(Dependent[qB]) + elif func_name == "constrain": + if ctx.getChild(2).getChild(0).getText().lower() == "dependent": + self.write("velocity_constraints = [i for i in dependent]\n") + x = (ctx.expr(0).getChildCount()-2)//2 + for i in range(x): + self.dependent_variables.append(self.getValue(ctx.expr(0).expr(i))) + + # Kane() + elif func_name == "kane": + if ctx.getChildCount() == 3: + self.kane_type = "no_args" + + # Settings + def exitSettings(self, ctx): + # Stores settings like Complex on/off, Degrees on/off etc in self.settings. + try: + self.settings.update({ctx.getChild(0).getText().lower(): + ctx.getChild(1).getText().lower()}) + except Exception: + pass + + def exitMassDecl2(self, ctx): + # Used for declaring the masses of particles and rigidbodies. + particle = self.symbol_table2[ctx.getChild(0).getText().lower()] + if ctx.getText().count("=") == 2: + if ctx.expr().expr(1) in self.numeric_expr: + e = "_sm.S(" + self.getValue(ctx.expr().expr(1)) + ")" + else: + e = self.getValue(ctx.expr().expr(1)) + self.symbol_table.update({ctx.expr().expr(0).getText().lower(): ctx.expr().expr(0).getText().lower()}) + self.write(ctx.expr().expr(0).getText().lower() + " = " + e + "\n") + mass = ctx.expr().expr(0).getText().lower() + else: + try: + if ctx.expr() in self.numeric_expr: + mass = "_sm.S(" + self.getValue(ctx.expr()) + ")" + else: + mass = self.getValue(ctx.expr()) + except Exception: + a_text = ctx.expr().getText().lower() + self.symbol_table.update({a_text: a_text}) + self.type.update({a_text: "constants"}) + self.write(a_text + " = " + "_sm.symbols('" + a_text + "')\n") + mass = a_text + + self.write(particle + ".mass = " + mass + "\n") + + def exitInertiaDecl(self, ctx): + inertia_list = [] + try: + ctx.ID(1).getText() + num = 5 + except Exception: + num = 2 + for i in range((ctx.getChildCount()-num)//2): + try: + if ctx.expr(i) in self.numeric_expr: + inertia_list.append("_sm.S(" + self.getValue(ctx.expr(i)) + ")") + else: + inertia_list.append(self.getValue(ctx.expr(i))) + except Exception: + a_text = ctx.expr(i).getText().lower() + self.symbol_table.update({a_text: a_text}) + self.type.update({a_text: "constants"}) + self.write(a_text + " = " + "_sm.symbols('" + a_text + "')\n") + inertia_list.append(a_text) + + if len(inertia_list) < 6: + for i in range(6-len(inertia_list)): + inertia_list.append("0") + # body_a.inertia = (_me.inertia(body_a, I1, I2, I3, 0, 0, 0), body_a_cm) + try: + frame = self.symbol_table2[ctx.ID(1).getText().lower()] + point = self.symbol_table2[ctx.ID(0).getText().lower().split('_')[1]] + body = self.symbol_table2[ctx.ID(0).getText().lower().split('_')[0]] + self.inertia_point.update({ctx.ID(0).getText().lower().split('_')[0] + : ctx.ID(0).getText().lower().split('_')[1]}) + self.write(body + ".inertia" + " = " + "(_me.inertia(" + frame + ", " + + ", ".join(inertia_list) + "), " + point + ")\n") + + except Exception: + body_name = self.symbol_table2[ctx.ID(0).getText().lower()] + body_name_cm = body_name + "_cm" + self.inertia_point.update({ctx.ID(0).getText().lower(): ctx.ID(0).getText().lower() + "o"}) + self.write(body_name + ".inertia" + " = " + "(_me.inertia(" + body_name + "_f" + ", " + + ", ".join(inertia_list) + "), " + body_name_cm + ")\n") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..e43924aac30903ade996b31921d3960afae90284 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py @@ -0,0 +1,38 @@ +from importlib.metadata import version +from sympy.external import import_module + + +autolevparser = import_module('sympy.parsing.autolev._antlr.autolevparser', + import_kwargs={'fromlist': ['AutolevParser']}) +autolevlexer = import_module('sympy.parsing.autolev._antlr.autolevlexer', + import_kwargs={'fromlist': ['AutolevLexer']}) +autolevlistener = import_module('sympy.parsing.autolev._antlr.autolevlistener', + import_kwargs={'fromlist': ['AutolevListener']}) + +AutolevParser = getattr(autolevparser, 'AutolevParser', None) +AutolevLexer = getattr(autolevlexer, 'AutolevLexer', None) +AutolevListener = getattr(autolevlistener, 'AutolevListener', None) + + +def parse_autolev(autolev_code, include_numeric): + antlr4 = import_module('antlr4') + if not antlr4 or not version('antlr4-python3-runtime').startswith('4.11'): + raise ImportError("Autolev parsing requires the antlr4 Python package," + " provided by pip (antlr4-python3-runtime)" + " conda (antlr-python-runtime), version 4.11") + try: + l = autolev_code.readlines() + input_stream = antlr4.InputStream("".join(l)) + except Exception: + input_stream = antlr4.InputStream(autolev_code) + + if AutolevListener: + from ._listener_autolev_antlr import MyListener + lexer = AutolevLexer(input_stream) + token_stream = antlr4.CommonTokenStream(lexer) + parser = AutolevParser(token_stream) + tree = parser.prog() + my_listener = MyListener(include_numeric) + walker = antlr4.ParseTreeWalker() + walker.walk(my_listener, tree) + return "".join(my_listener.output_code) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt new file mode 100644 index 0000000000000000000000000000000000000000..946b006bac33544fadd2dc6d24c22240c8fbc8e4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt @@ -0,0 +1,9 @@ +# parsing/tests/test_autolev.py uses the .al files in this directory as inputs and checks +# the equivalence of the parser generated codes and the respective .py files. + +# By default, this directory contains tests for all rules of the parser. + +# Additional tests consisting of full physics examples shall be made available soon in +# the form of another repository. One shall be able to copy the contents of that repo +# to this folder and use those tests after uncommenting the respective code in +# parsing/tests/test_autolev.py. diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al new file mode 100644 index 0000000000000000000000000000000000000000..3bbb4d51b853bfd759df38d666a42adc1cbea190 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al @@ -0,0 +1,33 @@ +CONSTANTS G,LB,W,H +MOTIONVARIABLES' THETA'',PHI'',OMEGA',ALPHA' +NEWTONIAN N +BODIES A,B +SIMPROT(N,A,2,THETA) +SIMPROT(A,B,3,PHI) +POINT O +LA = (LB-H/2)/2 +P_O_AO> = LA*A3> +P_O_BO> = LB*A3> +OMEGA = THETA' +ALPHA = PHI' +W_A_N> = OMEGA*N2> +W_B_A> = ALPHA*A3> +V_O_N> = 0> +V2PTS(N, A, O, AO) +V2PTS(N, A, O, BO) +MASS A=MA, B=MB +IAXX = 1/12*MA*(2*LA)^2 +IAYY = IAXX +IAZZ = 0 +IBXX = 1/12*MB*H^2 +IBYY = 1/12*MB*(W^2+H^2) +IBZZ = 1/12*MB*W^2 +INERTIA A, IAXX, IAYY, IAZZ +INERTIA B, IBXX, IBYY, IBZZ +GRAVITY(G*N3>) +ZERO = FR() + FRSTAR() +KANE() +INPUT LB=0.2,H=0.1,W=0.2,MA=0.01,MB=0.1,G=9.81 +INPUT THETA = 90 DEG, PHI = 0.5 DEG, OMEGA=0, ALPHA=0 +INPUT TFINAL=10, INTEGSTP=0.02 +CODE DYNAMICS() some_filename.c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..4435635720bb38f40366f55bb3ace0f6f6899284 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py @@ -0,0 +1,55 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +g, lb, w, h = _sm.symbols('g lb w h', real=True) +theta, phi, omega, alpha = _me.dynamicsymbols('theta phi omega alpha') +theta_d, phi_d, omega_d, alpha_d = _me.dynamicsymbols('theta_ phi_ omega_ alpha_', 1) +theta_dd, phi_dd = _me.dynamicsymbols('theta_ phi_', 2) +frame_n = _me.ReferenceFrame('n') +body_a_cm = _me.Point('a_cm') +body_a_cm.set_vel(frame_n, 0) +body_a_f = _me.ReferenceFrame('a_f') +body_a = _me.RigidBody('a', body_a_cm, body_a_f, _sm.symbols('m'), (_me.outer(body_a_f.x,body_a_f.x),body_a_cm)) +body_b_cm = _me.Point('b_cm') +body_b_cm.set_vel(frame_n, 0) +body_b_f = _me.ReferenceFrame('b_f') +body_b = _me.RigidBody('b', body_b_cm, body_b_f, _sm.symbols('m'), (_me.outer(body_b_f.x,body_b_f.x),body_b_cm)) +body_a_f.orient(frame_n, 'Axis', [theta, frame_n.y]) +body_b_f.orient(body_a_f, 'Axis', [phi, body_a_f.z]) +point_o = _me.Point('o') +la = (lb-h/2)/2 +body_a_cm.set_pos(point_o, la*body_a_f.z) +body_b_cm.set_pos(point_o, lb*body_a_f.z) +body_a_f.set_ang_vel(frame_n, omega*frame_n.y) +body_b_f.set_ang_vel(body_a_f, alpha*body_a_f.z) +point_o.set_vel(frame_n, 0) +body_a_cm.v2pt_theory(point_o,frame_n,body_a_f) +body_b_cm.v2pt_theory(point_o,frame_n,body_a_f) +ma = _sm.symbols('ma') +body_a.mass = ma +mb = _sm.symbols('mb') +body_b.mass = mb +iaxx = 1/12*ma*(2*la)**2 +iayy = iaxx +iazz = 0 +ibxx = 1/12*mb*h**2 +ibyy = 1/12*mb*(w**2+h**2) +ibzz = 1/12*mb*w**2 +body_a.inertia = (_me.inertia(body_a_f, iaxx, iayy, iazz, 0, 0, 0), body_a_cm) +body_b.inertia = (_me.inertia(body_b_f, ibxx, ibyy, ibzz, 0, 0, 0), body_b_cm) +force_a = body_a.mass*(g*frame_n.z) +force_b = body_b.mass*(g*frame_n.z) +kd_eqs = [theta_d - omega, phi_d - alpha] +forceList = [(body_a.masscenter,body_a.mass*(g*frame_n.z)), (body_b.masscenter,body_b.mass*(g*frame_n.z))] +kane = _me.KanesMethod(frame_n, q_ind=[theta,phi], u_ind=[omega, alpha], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([body_a, body_b], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {g:9.81, lb:0.2, w:0.2, h:0.1, ma:0.01, mb:0.1}, +specifieds={}, +initial_conditions={theta:_np.deg2rad(90), phi:_np.deg2rad(0.5), omega:0, alpha:0}, +times = _np.linspace(0.0, 10, 10/0.02)) + +y=sys.integrate() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al new file mode 100644 index 0000000000000000000000000000000000000000..0b6d72a072e093a6cb048a0b7976041ee9c2f4f3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al @@ -0,0 +1,25 @@ +MOTIONVARIABLES' Q{2}', U{2}' +CONSTANTS L,M,G +NEWTONIAN N +FRAMES A,B +SIMPROT(N, A, 3, Q1) +SIMPROT(N, B, 3, Q2) +W_A_N>=U1*N3> +W_B_N>=U2*N3> +POINT O +PARTICLES P,R +P_O_P> = L*A1> +P_P_R> = L*B1> +V_O_N> = 0> +V2PTS(N, A, O, P) +V2PTS(N, B, P, R) +MASS P=M, R=M +Q1' = U1 +Q2' = U2 +GRAVITY(G*N1>) +ZERO = FR() + FRSTAR() +KANE() +INPUT M=1,G=9.81,L=1 +INPUT Q1=.1,Q2=.2,U1=0,U2=0 +INPUT TFINAL=10, INTEGSTP=.01 +CODE DYNAMICS() some_filename.c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..12c73c3b4b198399f4c45f5e00d556c859caff74 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py @@ -0,0 +1,39 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') +q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) +l, m, g = _sm.symbols('l m g', real=True) +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_a.orient(frame_n, 'Axis', [q1, frame_n.z]) +frame_b.orient(frame_n, 'Axis', [q2, frame_n.z]) +frame_a.set_ang_vel(frame_n, u1*frame_n.z) +frame_b.set_ang_vel(frame_n, u2*frame_n.z) +point_o = _me.Point('o') +particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) +particle_r = _me.Particle('r', _me.Point('r_pt'), _sm.Symbol('m')) +particle_p.point.set_pos(point_o, l*frame_a.x) +particle_r.point.set_pos(particle_p.point, l*frame_b.x) +point_o.set_vel(frame_n, 0) +particle_p.point.v2pt_theory(point_o,frame_n,frame_a) +particle_r.point.v2pt_theory(particle_p.point,frame_n,frame_b) +particle_p.mass = m +particle_r.mass = m +force_p = particle_p.mass*(g*frame_n.x) +force_r = particle_r.mass*(g*frame_n.x) +kd_eqs = [q1_d - u1, q2_d - u2] +forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x)), (particle_r.point,particle_r.mass*(g*frame_n.x))] +kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u1, u2], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([particle_p, particle_r], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {l:1, m:1, g:9.81}, +specifieds={}, +initial_conditions={q1:.1, q2:.2, u1:0, u2:0}, +times = _np.linspace(0.0, 10, 10/.01)) + +y=sys.integrate() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al new file mode 100644 index 0000000000000000000000000000000000000000..4892e5ca8cb18cad6b14a2a37cbdc1f7fb8217ac --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al @@ -0,0 +1,19 @@ +CONSTANTS M,K,B,G +MOTIONVARIABLES' POSITION',SPEED' +VARIABLES O +FORCE = O*SIN(T) +NEWTONIAN CEILING +POINTS ORIGIN +V_ORIGIN_CEILING> = 0> +PARTICLES BLOCK +P_ORIGIN_BLOCK> = POSITION*CEILING1> +MASS BLOCK=M +V_BLOCK_CEILING>=SPEED*CEILING1> +POSITION' = SPEED +FORCE_MAGNITUDE = M*G-K*POSITION-B*SPEED+FORCE +FORCE_BLOCK>=EXPLICIT(FORCE_MAGNITUDE*CEILING1>) +ZERO = FR() + FRSTAR() +KANE() +INPUT TFINAL=10.0, INTEGSTP=0.01 +INPUT M=1.0, K=1.0, B=0.2, G=9.8, POSITION=0.1, SPEED=-1.0, O=2 +CODE DYNAMICS() dummy_file.c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py new file mode 100644 index 0000000000000000000000000000000000000000..8a5baab9642ff140e0ee81027a1e8f9152d7050c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py @@ -0,0 +1,31 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +m, k, b, g = _sm.symbols('m k b g', real=True) +position, speed = _me.dynamicsymbols('position speed') +position_d, speed_d = _me.dynamicsymbols('position_ speed_', 1) +o = _me.dynamicsymbols('o') +force = o*_sm.sin(_me.dynamicsymbols._t) +frame_ceiling = _me.ReferenceFrame('ceiling') +point_origin = _me.Point('origin') +point_origin.set_vel(frame_ceiling, 0) +particle_block = _me.Particle('block', _me.Point('block_pt'), _sm.Symbol('m')) +particle_block.point.set_pos(point_origin, position*frame_ceiling.x) +particle_block.mass = m +particle_block.point.set_vel(frame_ceiling, speed*frame_ceiling.x) +force_magnitude = m*g-k*position-b*speed+force +force_block = (force_magnitude*frame_ceiling.x).subs({position_d:speed}) +kd_eqs = [position_d - speed] +forceList = [(particle_block.point,(force_magnitude*frame_ceiling.x).subs({position_d:speed}))] +kane = _me.KanesMethod(frame_ceiling, q_ind=[position], u_ind=[speed], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([particle_block], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {m:1.0, k:1.0, b:0.2, g:9.8}, +specifieds={_me.dynamicsymbols('t'):lambda x, t: t, o:2}, +initial_conditions={position:0.1, speed:-1*1.0}, +times = _np.linspace(0.0, 10.0, 10.0/0.01)) + +y=sys.integrate() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..fc972ebd518e77da5e1902c149f2699979865e7f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py @@ -0,0 +1,36 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2 = _me.dynamicsymbols('q1 q2') +q1_d, q2_d = _me.dynamicsymbols('q1_ q2_', 1) +q1_dd, q2_dd = _me.dynamicsymbols('q1_ q2_', 2) +l, m, g = _sm.symbols('l m g', real=True) +frame_n = _me.ReferenceFrame('n') +point_pn = _me.Point('pn') +point_pn.set_vel(frame_n, 0) +theta1 = _sm.atan(q2/q1) +frame_a = _me.ReferenceFrame('a') +frame_a.orient(frame_n, 'Axis', [theta1, frame_n.z]) +particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) +particle_p.point.set_pos(point_pn, q1*frame_n.x+q2*frame_n.y) +particle_p.mass = m +particle_p.point.set_vel(frame_n, (point_pn.pos_from(particle_p.point)).dt(frame_n)) +f_v = _me.dot((particle_p.point.vel(frame_n)).express(frame_a), frame_a.x) +force_p = particle_p.mass*(g*frame_n.x) +dependent = _sm.Matrix([[0]]) +dependent[0] = f_v +velocity_constraints = [i for i in dependent] +u_q1_d = _me.dynamicsymbols('u_q1_d') +u_q2_d = _me.dynamicsymbols('u_q2_d') +kd_eqs = [q1_d-u_q1_d, q2_d-u_q2_d] +forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x))] +kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u_q2_d], u_dependent=[u_q1_d], kd_eqs = kd_eqs, velocity_constraints = velocity_constraints) +fr, frstar = kane.kanes_equations([particle_p], forceList) +zero = fr+frstar +f_c = point_pn.pos_from(particle_p.point).magnitude()-l +config = _sm.Matrix([[0]]) +config[0] = f_c +zero = zero.row_insert(zero.shape[0], _sm.Matrix([[0]])) +zero[zero.shape[0]-1] = config[0] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al new file mode 100644 index 0000000000000000000000000000000000000000..457e79fd646677c0decdc69f921bc05e9e0dcf51 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al @@ -0,0 +1,8 @@ +% ruletest1.al +CONSTANTS F = 3, G = 9.81 +CONSTANTS A, B +CONSTANTS S, S1, S2+, S3+, S4- +CONSTANTS K{4}, L{1:3}, P{1:2,1:3} +CONSTANTS C{2,3} +E1 = A*F + S2 - G +E2 = F^2 + K3*K2*G diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py new file mode 100644 index 0000000000000000000000000000000000000000..8466392ac930f13f2419c9c04eef9dcc2884e9bd --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py @@ -0,0 +1,15 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +f = _sm.S(3) +g = _sm.S(9.81) +a, b = _sm.symbols('a b', real=True) +s, s1 = _sm.symbols('s s1', real=True) +s2, s3 = _sm.symbols('s2 s3', real=True, nonnegative=True) +s4 = _sm.symbols('s4', real=True, nonpositive=True) +k1, k2, k3, k4, l1, l2, l3, p11, p12, p13, p21, p22, p23 = _sm.symbols('k1 k2 k3 k4 l1 l2 l3 p11 p12 p13 p21 p22 p23', real=True) +c11, c12, c13, c21, c22, c23 = _sm.symbols('c11 c12 c13 c21 c22 c23', real=True) +e1 = a*f+s2-g +e2 = f**2+k3*k2*g diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al new file mode 100644 index 0000000000000000000000000000000000000000..9d5f76f063c43bcb5e2a8d4f29619a6952abf9e5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al @@ -0,0 +1,58 @@ +% ruletest10.al + +VARIABLES X,Y +COMPLEX ON +CONSTANTS A,B +E = A*(B*X+Y)^2 +M = [E;E] +EXPAND(E) +EXPAND(M) +FACTOR(E,X) +FACTOR(M,X) + +EQN[1] = A*X + B*Y +EQN[2] = 2*A*X - 3*B*Y +SOLVE(EQN, X, Y) +RHS_Y = RHS(Y) +E = (X+Y)^2 + 2*X^2 +ARRANGE(E, 2, X) + +CONSTANTS A,B,C +M = [A,B;C,0] +M2 = EVALUATE(M,A=1,B=2,C=3) +EIG(M2, EIGVALUE, EIGVEC) + +NEWTONIAN N +FRAMES A +SIMPROT(N, A, N1>, X) +DEGREES OFF +SIMPROT(N, A, N1>, PI/2) + +CONSTANTS C{3} +V> = C1*A1> + C2*A2> + C3*A3> +POINTS O, P +P_P_O> = C1*A1> +EXPRESS(V>,N) +EXPRESS(P_P_O>,N) +W_A_N> = C3*A3> +ANGVEL(A,N) + +V2PTS(N,A,O,P) +PARTICLES P{2} +V2PTS(N,A,P1,P2) +A2PTS(N,A,P1,P) + +BODIES B{2} +CONSTANT G +GRAVITY(G*N1>) + +VARIABLE Z +V> = X*A1> + Y*A3> +P_P_O> = X*A1> + Y*A2> +X = 2*Z +Y = Z +EXPLICIT(V>) +EXPLICIT(P_P_O>) + +FORCE(O/P1, X*Y*A1>) +FORCE(P2, X*Y*A1>) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py new file mode 100644 index 0000000000000000000000000000000000000000..2b9674e47d5f6132c5a79a33b9d8d55a131942d6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py @@ -0,0 +1,64 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a, b = _sm.symbols('a b', real=True) +e = a*(b*x+y)**2 +m = _sm.Matrix([e,e]).reshape(2, 1) +e = e.expand() +m = _sm.Matrix([i.expand() for i in m]).reshape((m).shape[0], (m).shape[1]) +e = _sm.factor(e, x) +m = _sm.Matrix([_sm.factor(i,x) for i in m]).reshape((m).shape[0], (m).shape[1]) +eqn = _sm.Matrix([[0]]) +eqn[0] = a*x+b*y +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = 2*a*x-3*b*y +print(_sm.solve(eqn,x,y)) +rhs_y = _sm.solve(eqn,x,y)[y] +e = (x+y)**2+2*x**2 +e.collect(x) +a, b, c = _sm.symbols('a b c', real=True) +m = _sm.Matrix([a,b,c,0]).reshape(2, 2) +m2 = _sm.Matrix([i.subs({a:1,b:2,c:3}) for i in m]).reshape((m).shape[0], (m).shape[1]) +eigvalue = _sm.Matrix([i.evalf() for i in (m2).eigenvals().keys()]) +eigvec = _sm.Matrix([i[2][0].evalf() for i in (m2).eigenvects()]).reshape(m2.shape[0], m2.shape[1]) +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +frame_a.orient(frame_n, 'Axis', [x, frame_n.x]) +frame_a.orient(frame_n, 'Axis', [_sm.pi/2, frame_n.x]) +c1, c2, c3 = _sm.symbols('c1 c2 c3', real=True) +v = c1*frame_a.x+c2*frame_a.y+c3*frame_a.z +point_o = _me.Point('o') +point_p = _me.Point('p') +point_o.set_pos(point_p, c1*frame_a.x) +v = (v).express(frame_n) +point_o.set_pos(point_p, (point_o.pos_from(point_p)).express(frame_n)) +frame_a.set_ang_vel(frame_n, c3*frame_a.z) +print(frame_n.ang_vel_in(frame_a)) +point_p.v2pt_theory(point_o,frame_n,frame_a) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +particle_p2.point.v2pt_theory(particle_p1.point,frame_n,frame_a) +point_p.a2pt_theory(particle_p1.point,frame_n,frame_a) +body_b1_cm = _me.Point('b1_cm') +body_b1_cm.set_vel(frame_n, 0) +body_b1_f = _me.ReferenceFrame('b1_f') +body_b1 = _me.RigidBody('b1', body_b1_cm, body_b1_f, _sm.symbols('m'), (_me.outer(body_b1_f.x,body_b1_f.x),body_b1_cm)) +body_b2_cm = _me.Point('b2_cm') +body_b2_cm.set_vel(frame_n, 0) +body_b2_f = _me.ReferenceFrame('b2_f') +body_b2 = _me.RigidBody('b2', body_b2_cm, body_b2_f, _sm.symbols('m'), (_me.outer(body_b2_f.x,body_b2_f.x),body_b2_cm)) +g = _sm.symbols('g', real=True) +force_p1 = particle_p1.mass*(g*frame_n.x) +force_p2 = particle_p2.mass*(g*frame_n.x) +force_b1 = body_b1.mass*(g*frame_n.x) +force_b2 = body_b2.mass*(g*frame_n.x) +z = _me.dynamicsymbols('z') +v = x*frame_a.x+y*frame_a.z +point_o.set_pos(point_p, x*frame_a.x+y*frame_a.y) +v = (v).subs({x:2*z, y:z}) +point_o.set_pos(point_p, (point_o.pos_from(point_p)).subs({x:2*z, y:z})) +force_o = -1*(x*y*frame_a.x) +force_p1 = particle_p1.mass*(g*frame_n.x)+ x*y*frame_a.x diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al new file mode 100644 index 0000000000000000000000000000000000000000..60934c1ca563024828110bfe984a90d5686b89e4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al @@ -0,0 +1,6 @@ +VARIABLES X, Y +CONSTANTS A{1:2, 1:2}, B{1:2} +EQN[1] = A11*x + A12*y - B1 +EQN[2] = A21*x + A22*y - B2 +INPUT A11=2, A12=5, A21=3, A22=4, B1=7, B2=6 +CODE ALGEBRAIC(EQN, X, Y) some_filename.c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py new file mode 100644 index 0000000000000000000000000000000000000000..4ec2397ea96261d7b582d1f699e3897caae88f20 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py @@ -0,0 +1,14 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a11, a12, a21, a22, b1, b2 = _sm.symbols('a11 a12 a21 a22 b1 b2', real=True) +eqn = _sm.Matrix([[0]]) +eqn[0] = a11*x+a12*y-b1 +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = a21*x+a22*y-b2 +eqn_list = [] +for i in eqn: eqn_list.append(i.subs({a11:2, a12:5, a21:3, a22:4, b1:7, b2:6})) +print(_sm.linsolve(eqn_list, x,y)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al new file mode 100644 index 0000000000000000000000000000000000000000..f147f55afd1438436767960e0487d5d9e7161c8f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al @@ -0,0 +1,7 @@ +VARIABLES X,Y +CONSTANTS A,B,R +EQN[1] = A*X^3+B*Y^2-R +EQN[2] = A*SIN(X)^2 + B*COS(2*Y) - R^2 +INPUT A=2.0, B=3.0, R=1.0 +INPUT X = 30 DEG, Y = 3.14 +CODE NONLINEAR(EQN,X,Y) some_filename.c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py new file mode 100644 index 0000000000000000000000000000000000000000..3d7d996fa649f796a536dba20c1a36554acd8046 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py @@ -0,0 +1,14 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a, b, r = _sm.symbols('a b r', real=True) +eqn = _sm.Matrix([[0]]) +eqn[0] = a*x**3+b*y**2-r +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = a*_sm.sin(x)**2+b*_sm.cos(2*y)-r**2 +matrix_list = [] +for i in eqn:matrix_list.append(i.subs({a:2.0, b:3.0, r:1.0})) +print(_sm.nsolve(matrix_list,(x,y),(_np.deg2rad(30),3.14))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al new file mode 100644 index 0000000000000000000000000000000000000000..17937e58bd20a9fb82f44ccd05f0c081a1aa6c9b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al @@ -0,0 +1,12 @@ +% ruletest2.al +VARIABLES X1,X2 +SPECIFIED F1 = X1*X2 + 3*X1^2 +SPECIFIED F2=X1*T+X2*T^2 +VARIABLE X', Y'' +MOTIONVARIABLES Q{3}, U{2} +VARIABLES P{2}' +VARIABLE W{3}', R{2}'' +VARIABLES C{1:2, 1:2} +VARIABLES D{1,3} +VARIABLES J{1:2} +IMAGINARY N diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py new file mode 100644 index 0000000000000000000000000000000000000000..31c1d9974c2292466b805b91f8254bffaa94e2ac --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py @@ -0,0 +1,22 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x1, x2 = _me.dynamicsymbols('x1 x2') +f1 = x1*x2+3*x1**2 +f2 = x1*_me.dynamicsymbols._t+x2*_me.dynamicsymbols._t**2 +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +y_dd = _me.dynamicsymbols('y_', 2) +q1, q2, q3, u1, u2 = _me.dynamicsymbols('q1 q2 q3 u1 u2') +p1, p2 = _me.dynamicsymbols('p1 p2') +p1_d, p2_d = _me.dynamicsymbols('p1_ p2_', 1) +w1, w2, w3, r1, r2 = _me.dynamicsymbols('w1 w2 w3 r1 r2') +w1_d, w2_d, w3_d, r1_d, r2_d = _me.dynamicsymbols('w1_ w2_ w3_ r1_ r2_', 1) +r1_dd, r2_dd = _me.dynamicsymbols('r1_ r2_', 2) +c11, c12, c21, c22 = _me.dynamicsymbols('c11 c12 c21 c22') +d11, d12, d13 = _me.dynamicsymbols('d11 d12 d13') +j1, j2 = _me.dynamicsymbols('j1 j2') +n = _sm.symbols('n') +n = _sm.I diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al new file mode 100644 index 0000000000000000000000000000000000000000..f263f1802ebca2725481dd5fdd3540bf8e9f11bf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al @@ -0,0 +1,25 @@ +% ruletest3.al +FRAMES A, B +NEWTONIAN N + +VARIABLES X{3} +CONSTANTS L + +V1> = X1*A1> + X2*A2> + X3*A3> +V2> = X1*B1> + X2*B2> + X3*B3> +V3> = X1*N1> + X2*N2> + X3*N3> + +V> = V1> + V2> + V3> + +POINTS C, D +POINTS PO{3} + +PARTICLES L +PARTICLES P{3} + +BODIES S +BODIES R{2} + +V4> = X1*S1> + X2*S2> + X3*S3> + +P_C_SO> = L*N1> diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py new file mode 100644 index 0000000000000000000000000000000000000000..23f79aa571337f200b3ff4d56b5747f7704985c0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py @@ -0,0 +1,37 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_n = _me.ReferenceFrame('n') +x1, x2, x3 = _me.dynamicsymbols('x1 x2 x3') +l = _sm.symbols('l', real=True) +v1 = x1*frame_a.x+x2*frame_a.y+x3*frame_a.z +v2 = x1*frame_b.x+x2*frame_b.y+x3*frame_b.z +v3 = x1*frame_n.x+x2*frame_n.y+x3*frame_n.z +v = v1+v2+v3 +point_c = _me.Point('c') +point_d = _me.Point('d') +point_po1 = _me.Point('po1') +point_po2 = _me.Point('po2') +point_po3 = _me.Point('po3') +particle_l = _me.Particle('l', _me.Point('l_pt'), _sm.Symbol('m')) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +particle_p3 = _me.Particle('p3', _me.Point('p3_pt'), _sm.Symbol('m')) +body_s_cm = _me.Point('s_cm') +body_s_cm.set_vel(frame_n, 0) +body_s_f = _me.ReferenceFrame('s_f') +body_s = _me.RigidBody('s', body_s_cm, body_s_f, _sm.symbols('m'), (_me.outer(body_s_f.x,body_s_f.x),body_s_cm)) +body_r1_cm = _me.Point('r1_cm') +body_r1_cm.set_vel(frame_n, 0) +body_r1_f = _me.ReferenceFrame('r1_f') +body_r1 = _me.RigidBody('r1', body_r1_cm, body_r1_f, _sm.symbols('m'), (_me.outer(body_r1_f.x,body_r1_f.x),body_r1_cm)) +body_r2_cm = _me.Point('r2_cm') +body_r2_cm.set_vel(frame_n, 0) +body_r2_f = _me.ReferenceFrame('r2_f') +body_r2 = _me.RigidBody('r2', body_r2_cm, body_r2_f, _sm.symbols('m'), (_me.outer(body_r2_f.x,body_r2_f.x),body_r2_cm)) +v4 = x1*body_s_f.x+x2*body_s_f.y+x3*body_s_f.z +body_s_cm.set_pos(point_c, l*frame_n.x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al new file mode 100644 index 0000000000000000000000000000000000000000..7302bd7724bad9b763c75fe4230faa42b5070408 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al @@ -0,0 +1,20 @@ +% ruletest4.al + +FRAMES A, B +MOTIONVARIABLES Q{3} +SIMPROT(A, B, 1, Q3) +DCM = A_B +M = DCM*3 - A_B + +VARIABLES R +CIRCLE_AREA = PI*R^2 + +VARIABLES U, A +VARIABLES X, Y +S = U*T - 1/2*A*T^2 + +EXPR1 = 2*A*0.5 - 1.25 + 0.25 +EXPR2 = -X^2 + Y^2 + 0.25*(X+Y)^2 +EXPR3 = 0.5E-10 + +DYADIC>> = A1>*A1> + A2>*A2> + A3>*A3> diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py new file mode 100644 index 0000000000000000000000000000000000000000..74b18543e04d6c9e42dd569d2152040c13ae0899 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py @@ -0,0 +1,20 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +q1, q2, q3 = _me.dynamicsymbols('q1 q2 q3') +frame_b.orient(frame_a, 'Axis', [q3, frame_a.x]) +dcm = frame_a.dcm(frame_b) +m = dcm*3-frame_a.dcm(frame_b) +r = _me.dynamicsymbols('r') +circle_area = _sm.pi*r**2 +u, a = _me.dynamicsymbols('u a') +x, y = _me.dynamicsymbols('x y') +s = u*_me.dynamicsymbols._t-1/2*a*_me.dynamicsymbols._t**2 +expr1 = 2*a*0.5-1.25+0.25 +expr2 = -1*x**2+y**2+0.25*(x+y)**2 +expr3 = 0.5*10**(-10) +dyadic = _me.outer(frame_a.x, frame_a.x)+_me.outer(frame_a.y, frame_a.y)+_me.outer(frame_a.z, frame_a.z) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al new file mode 100644 index 0000000000000000000000000000000000000000..a859dc8bb1f0251af14809681d995c59b31377ba --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al @@ -0,0 +1,32 @@ +% ruletest5.al +VARIABLES X', Y' + +E1 = (X+Y)^2 + (X-Y)^3 +E2 = (X-Y)^2 +E3 = X^2 + Y^2 + 2*X*Y + +M1 = [E1;E2] +M2 = [(X+Y)^2,(X-Y)^2] +M3 = M1 + [X;Y] + +AM = EXPAND(M1) +CM = EXPAND([(X+Y)^2,(X-Y)^2]) +EM = EXPAND(M1 + [X;Y]) +F = EXPAND(E1) +G = EXPAND(E2) + +A = FACTOR(E3, X) +BM = FACTOR(M1, X) +CM = FACTOR(M1 + [X;Y], X) + +A = D(E3, X) +B = D(E3, Y) +CM = D(M2, X) +DM = D(M1 + [X;Y], X) +FRAMES A, B +A_B = [1,0,0;1,0,0;1,0,0] +V1> = X*A1> + Y*A2> + X*Y*A3> +E> = D(V1>, X, B) +FM = DT(M1) +GM = DT([(X+Y)^2,(X-Y)^2]) +H> = DT(V1>, B) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py new file mode 100644 index 0000000000000000000000000000000000000000..93684435b402f5b56e2f4a5c3c81500208556423 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py @@ -0,0 +1,33 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +e1 = (x+y)**2+(x-y)**3 +e2 = (x-y)**2 +e3 = x**2+y**2+2*x*y +m1 = _sm.Matrix([e1,e2]).reshape(2, 1) +m2 = _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2) +m3 = m1+_sm.Matrix([x,y]).reshape(2, 1) +am = _sm.Matrix([i.expand() for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +cm = _sm.Matrix([i.expand() for i in _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)]).reshape((_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[0], (_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[1]) +em = _sm.Matrix([i.expand() for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +f = (e1).expand() +g = (e2).expand() +a = _sm.factor((e3), x) +bm = _sm.Matrix([_sm.factor(i, x) for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +cm = _sm.Matrix([_sm.factor(i, x) for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +a = (e3).diff(x) +b = (e3).diff(y) +cm = _sm.Matrix([i.diff(x) for i in m2]).reshape((m2).shape[0], (m2).shape[1]) +dm = _sm.Matrix([i.diff(x) for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_b.orient(frame_a, 'DCM', _sm.Matrix([1,0,0,1,0,0,1,0,0]).reshape(3, 3)) +v1 = x*frame_a.x+y*frame_a.y+x*y*frame_a.z +e = (v1).diff(x, frame_b) +fm = _sm.Matrix([i.diff(_sm.Symbol('t')) for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +gm = _sm.Matrix([i.diff(_sm.Symbol('t')) for i in _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)]).reshape((_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[0], (_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[1]) +h = (v1).dt(frame_b) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al new file mode 100644 index 0000000000000000000000000000000000000000..7ec3ba61590e77772ae631237df048b932fe778c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al @@ -0,0 +1,41 @@ +% ruletest6.al +VARIABLES Q{2} +VARIABLES X,Y,Z +Q1 = X^2 + Y^2 +Q2 = X-Y +E = Q1 + Q2 +A = EXPLICIT(E) +E2 = COS(X) +E3 = COS(X*Y) +A = TAYLOR(E2, 0:2, X=0) +B = TAYLOR(E3, 0:2, X=0, Y=0) + +E = EXPAND((X+Y)^2) +A = EVALUATE(E, X=1, Y=Z) +BM = EVALUATE([E;2*E], X=1, Y=Z) + +E = Q1 + Q2 +A = EVALUATE(E, X=2, Y=Z^2) + +CONSTANTS J,K,L +P1 = POLYNOMIAL([J,K,L],X) +P2 = POLYNOMIAL(J*X+K,X,1) + +ROOT1 = ROOTS(P1, X, 2) +ROOT2 = ROOTS([1;2;3]) + +M = [1,2,3,4;5,6,7,8;9,10,11,12;13,14,15,16] + +AM = TRANSPOSE(M) + M +BM = EIG(M) +C1 = DIAGMAT(4, 1) +C2 = DIAGMAT(3, 4, 2) +DM = INV(M+C1) +E = DET(M+C1) + TRACE([1,0;0,1]) +F = ELEMENT(M, 2, 3) + +A = COLS(M) +BM = COLS(M, 1) +CM = COLS(M, 1, 2:4, 3) +DM = ROWS(M, 1) +EM = ROWS(M, 1, 2:4, 3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py new file mode 100644 index 0000000000000000000000000000000000000000..85f1a0b49518bb0ae5766cbe91b9c24a1b8e9c20 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py @@ -0,0 +1,36 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2 = _me.dynamicsymbols('q1 q2') +x, y, z = _me.dynamicsymbols('x y z') +e = q1+q2 +a = (e).subs({q1:x**2+y**2, q2:x-y}) +e2 = _sm.cos(x) +e3 = _sm.cos(x*y) +a = (e2).series(x, 0, 2).removeO() +b = (e3).series(x, 0, 2).removeO().series(y, 0, 2).removeO() +e = ((x+y)**2).expand() +a = (e).subs({q1:x**2+y**2,q2:x-y}).subs({x:1,y:z}) +bm = _sm.Matrix([i.subs({x:1,y:z}) for i in _sm.Matrix([e,2*e]).reshape(2, 1)]).reshape((_sm.Matrix([e,2*e]).reshape(2, 1)).shape[0], (_sm.Matrix([e,2*e]).reshape(2, 1)).shape[1]) +e = q1+q2 +a = (e).subs({q1:x**2+y**2,q2:x-y}).subs({x:2,y:z**2}) +j, k, l = _sm.symbols('j k l', real=True) +p1 = _sm.Poly(_sm.Matrix([j,k,l]).reshape(1, 3), x) +p2 = _sm.Poly(j*x+k, x) +root1 = [i.evalf() for i in _sm.solve(p1, x)] +root2 = [i.evalf() for i in _sm.solve(_sm.Poly(_sm.Matrix([1,2,3]).reshape(3, 1), x),x)] +m = _sm.Matrix([1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16]).reshape(4, 4) +am = (m).T+m +bm = _sm.Matrix([i.evalf() for i in (m).eigenvals().keys()]) +c1 = _sm.diag(1,1,1,1) +c2 = _sm.Matrix([2 if i==j else 0 for i in range(3) for j in range(4)]).reshape(3, 4) +dm = (m+c1)**(-1) +e = (m+c1).det()+(_sm.Matrix([1,0,0,1]).reshape(2, 2)).trace() +f = (m)[1,2] +a = (m).cols +bm = (m).col(0) +cm = _sm.Matrix([(m).T.row(0),(m).T.row(1),(m).T.row(2),(m).T.row(3),(m).T.row(2)]) +dm = (m).row(0) +em = _sm.Matrix([(m).row(0),(m).row(1),(m).row(2),(m).row(3),(m).row(2)]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py new file mode 100644 index 0000000000000000000000000000000000000000..19147856dc3b0d451184a6bb539c1c331f61a6d2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py @@ -0,0 +1,35 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +e = _sm.cos(x)+_sm.sin(x)+_sm.tan(x)+_sm.cosh(x)+_sm.sinh(x)+_sm.tanh(x)+_sm.acos(x)+_sm.asin(x)+_sm.atan(x)+_sm.log(x)+_sm.exp(x)+_sm.sqrt(x)+_sm.factorial(x)+_sm.ceiling(x)+_sm.floor(x)+_sm.sign(x) +e = (x)**2+_sm.log(x, 10) +a = _sm.Abs(-1*1)+int(1.5)+round(1.9) +e1 = 2*x+3*y +e2 = x+y +am = _sm.Matrix([e1.expand().coeff(x), e1.expand().coeff(y), e2.expand().coeff(x), e2.expand().coeff(y)]).reshape(2, 2) +b = (e1).expand().coeff(x) +c = (e2).expand().coeff(y) +d1 = (e1).collect(x).coeff(x,0) +d2 = (e1).collect(x).coeff(x,1) +fm = _sm.Matrix([i.collect(x)for i in _sm.Matrix([e1,e2]).reshape(1, 2)]).reshape((_sm.Matrix([e1,e2]).reshape(1, 2)).shape[0], (_sm.Matrix([e1,e2]).reshape(1, 2)).shape[1]) +f = (e1).collect(y) +g = (e1).subs({x:2*x}) +gm = _sm.Matrix([i.subs({x:3}) for i in _sm.Matrix([e1,e2]).reshape(2, 1)]).reshape((_sm.Matrix([e1,e2]).reshape(2, 1)).shape[0], (_sm.Matrix([e1,e2]).reshape(2, 1)).shape[1]) +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +theta = _me.dynamicsymbols('theta') +frame_b.orient(frame_a, 'Axis', [theta, frame_a.z]) +v1 = 2*frame_a.x-3*frame_a.y+frame_a.z +v2 = frame_b.x+frame_b.y+frame_b.z +a = _me.dot(v1, v2) +bm = _sm.Matrix([_me.dot(v1, v2),_me.dot(v1, 2*v2)]).reshape(2, 1) +c = _me.cross(v1, v2) +d = 2*v1.magnitude()+3*v1.magnitude() +dyadic = _me.outer(3*frame_a.x, frame_a.x)+_me.outer(frame_a.y, frame_a.y)+_me.outer(2*frame_a.z, frame_a.z) +am = (dyadic).to_matrix(frame_b) +m = _sm.Matrix([1,2,3]).reshape(3, 1) +v = m[0]*frame_a.x +m[1]*frame_a.y +m[2]*frame_a.z diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al new file mode 100644 index 0000000000000000000000000000000000000000..4b2462c51e6730f46bf60b4b21ab6cfbf1993640 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al @@ -0,0 +1,38 @@ +% ruletest8.al +FRAMES A +CONSTANTS C{3} +A>> = EXPRESS(1>>,A) +PARTICLES P1, P2 +BODIES R +R_A = [1,1,1;1,1,0;0,0,1] +POINT O +MASS P1=M1, P2=M2, R=MR +INERTIA R, I1, I2, I3 +P_P1_O> = C1*A1> +P_P2_O> = C2*A2> +P_RO_O> = C3*A3> +A>> = EXPRESS(I_P1_O>>, A) +A>> = EXPRESS(I_P2_O>>, A) +A>> = EXPRESS(I_R_O>>, A) +A>> = EXPRESS(INERTIA(O), A) +A>> = EXPRESS(INERTIA(O, P1, R), A) +A>> = EXPRESS(I_R_O>>, A) +A>> = EXPRESS(I_R_RO>>, A) + +P_P1_P2> = C1*A1> + C2*A2> +P_P1_RO> = C3*A1> +P_P2_RO> = C3*A2> + +B> = CM(O) +B> = CM(O, P1, R) +B> = CM(P1) + +MOTIONVARIABLES U{3} +V> = U1*A1> + U2*A2> + U3*A3> +U> = UNITVEC(V> + C1*A1>) +V_P1_A> = U1*A1> +A> = PARTIALS(V_P1_A>, U1) + +M = MASS(P1,R) +M = MASS(P2) +M = MASS() \ No newline at end of file diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py new file mode 100644 index 0000000000000000000000000000000000000000..6809c47138e40027c700536e807ca7cfa5f468d7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py @@ -0,0 +1,49 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +c1, c2, c3 = _sm.symbols('c1 c2 c3', real=True) +a = _me.inertia(frame_a, 1, 1, 1) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +body_r_cm = _me.Point('r_cm') +body_r_f = _me.ReferenceFrame('r_f') +body_r = _me.RigidBody('r', body_r_cm, body_r_f, _sm.symbols('m'), (_me.outer(body_r_f.x,body_r_f.x),body_r_cm)) +frame_a.orient(body_r_f, 'DCM', _sm.Matrix([1,1,1,1,1,0,0,0,1]).reshape(3, 3)) +point_o = _me.Point('o') +m1 = _sm.symbols('m1') +particle_p1.mass = m1 +m2 = _sm.symbols('m2') +particle_p2.mass = m2 +mr = _sm.symbols('mr') +body_r.mass = mr +i1 = _sm.symbols('i1') +i2 = _sm.symbols('i2') +i3 = _sm.symbols('i3') +body_r.inertia = (_me.inertia(body_r_f, i1, i2, i3, 0, 0, 0), body_r_cm) +point_o.set_pos(particle_p1.point, c1*frame_a.x) +point_o.set_pos(particle_p2.point, c2*frame_a.y) +point_o.set_pos(body_r_cm, c3*frame_a.z) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p2.mass, particle_p2.point.pos_from(point_o), frame_a) +a = body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) + _me.inertia_of_point_mass(particle_p2.mass, particle_p2.point.pos_from(point_o), frame_a) + body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) + body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = body_r.inertia[0] +particle_p2.point.set_pos(particle_p1.point, c1*frame_a.x+c2*frame_a.y) +body_r_cm.set_pos(particle_p1.point, c3*frame_a.x) +body_r_cm.set_pos(particle_p2.point, c3*frame_a.y) +b = _me.functions.center_of_mass(point_o,particle_p1, particle_p2, body_r) +b = _me.functions.center_of_mass(point_o,particle_p1, body_r) +b = _me.functions.center_of_mass(particle_p1.point,particle_p1, particle_p2, body_r) +u1, u2, u3 = _me.dynamicsymbols('u1 u2 u3') +v = u1*frame_a.x+u2*frame_a.y+u3*frame_a.z +u = (v+c1*frame_a.x).normalize() +particle_p1.point.set_vel(frame_a, u1*frame_a.x) +a = particle_p1.point.partial_velocity(frame_a, u1) +m = particle_p1.mass+body_r.mass +m = particle_p2.mass +m = particle_p1.mass+particle_p2.mass+body_r.mass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al new file mode 100644 index 0000000000000000000000000000000000000000..df5c70f05b76fc215f829672e281491b0c96c6a6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al @@ -0,0 +1,54 @@ +% ruletest9.al +NEWTONIAN N +FRAMES A +A> = 0> +D>> = EXPRESS(1>>, A) + +POINTS PO{2} +PARTICLES P{2} +MOTIONVARIABLES' C{3}' +BODIES R +P_P1_PO2> = C1*A1> +V> = 2*P_P1_PO2> + C2*A2> + +W_A_N> = C3*A3> +V> = 2*W_A_N> + C2*A2> +W_R_N> = C3*A3> +V> = 2*W_R_N> + C2*A2> + +ALF_A_N> = DT(W_A_N>, A) +V> = 2*ALF_A_N> + C2*A2> + +V_P1_A> = C1*A1> + C3*A2> +A_RO_N> = C2*A2> +V_A> = CROSS(A_RO_N>, V_P1_A>) + +X_B_C> = V_A> +X_B_D> = 2*X_B_C> +A_B_C_D_E> = X_B_D>*2 + +A_B_C = 2*C1*C2*C3 +A_B_C += 2*C1 +A_B_C := 3*C1 + +MOTIONVARIABLES' Q{2}', U{2}' +Q1' = U1 +Q2' = U2 + +VARIABLES X'', Y'' +SPECIFIED YY +Y'' = X*X'^2 + 1 +YY = X*X'^2 + 1 + +M[1] = 2*X +M[2] = 2*Y +A = 2*M[1] + +M = [1,2,3;4,5,6;7,8,9] +M[1, 2] = 5 +A = M[1, 2]*2 + +FORCE_RO> = Q1*N1> +TORQUE_A> = Q2*N3> +FORCE_RO> = Q2*N2> +F> = FORCE_RO>*2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py new file mode 100644 index 0000000000000000000000000000000000000000..09d8ae4ee8385bde5c38b946458a43c8ffdaa9b8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py @@ -0,0 +1,55 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +a = 0 +d = _me.inertia(frame_a, 1, 1, 1) +point_po1 = _me.Point('po1') +point_po2 = _me.Point('po2') +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +c1, c2, c3 = _me.dynamicsymbols('c1 c2 c3') +c1_d, c2_d, c3_d = _me.dynamicsymbols('c1_ c2_ c3_', 1) +body_r_cm = _me.Point('r_cm') +body_r_cm.set_vel(frame_n, 0) +body_r_f = _me.ReferenceFrame('r_f') +body_r = _me.RigidBody('r', body_r_cm, body_r_f, _sm.symbols('m'), (_me.outer(body_r_f.x,body_r_f.x),body_r_cm)) +point_po2.set_pos(particle_p1.point, c1*frame_a.x) +v = 2*point_po2.pos_from(particle_p1.point)+c2*frame_a.y +frame_a.set_ang_vel(frame_n, c3*frame_a.z) +v = 2*frame_a.ang_vel_in(frame_n)+c2*frame_a.y +body_r_f.set_ang_vel(frame_n, c3*frame_a.z) +v = 2*body_r_f.ang_vel_in(frame_n)+c2*frame_a.y +frame_a.set_ang_acc(frame_n, (frame_a.ang_vel_in(frame_n)).dt(frame_a)) +v = 2*frame_a.ang_acc_in(frame_n)+c2*frame_a.y +particle_p1.point.set_vel(frame_a, c1*frame_a.x+c3*frame_a.y) +body_r_cm.set_acc(frame_n, c2*frame_a.y) +v_a = _me.cross(body_r_cm.acc(frame_n), particle_p1.point.vel(frame_a)) +x_b_c = v_a +x_b_d = 2*x_b_c +a_b_c_d_e = x_b_d*2 +a_b_c = 2*c1*c2*c3 +a_b_c += 2*c1 +a_b_c = 3*c1 +q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') +q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +x_dd, y_dd = _me.dynamicsymbols('x_ y_', 2) +yy = _me.dynamicsymbols('yy') +yy = x*x_d**2+1 +m = _sm.Matrix([[0]]) +m[0] = 2*x +m = m.row_insert(m.shape[0], _sm.Matrix([[0]])) +m[m.shape[0]-1] = 2*y +a = 2*m[0] +m = _sm.Matrix([1,2,3,4,5,6,7,8,9]).reshape(3, 3) +m[0,1] = 5 +a = m[0, 1]*2 +force_ro = q1*frame_n.x +torque_a = q2*frame_n.z +force_ro = q1*frame_n.x + q2*frame_n.y +f = force_ro*2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..18d3d5301cb001c78fc4a9bc04b25aa36f282a93 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/__init__.py @@ -0,0 +1 @@ +"""Used for translating C source code into a SymPy expression""" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9e7223f8351205272e803773589649fcf1902f15 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py @@ -0,0 +1,1059 @@ +from sympy.external import import_module +import os + +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +""" +This module contains all the necessary Classes and Function used to Parse C and +C++ code into SymPy expression +The module serves as a backend for SymPyExpression to parse C code +It is also dependent on Clang's AST and SymPy's Codegen AST. +The module only supports the features currently supported by the Clang and +codegen AST which will be updated as the development of codegen AST and this +module progresses. +You might find unexpected bugs and exceptions while using the module, feel free +to report them to the SymPy Issue Tracker + +Features Supported +================== + +- Variable Declarations (integers and reals) +- Assignment (using integer & floating literal and function calls) +- Function Definitions and Declaration +- Function Calls +- Compound statements, Return statements + +Notes +===== + +The module is dependent on an external dependency which needs to be installed +to use the features of this module. + +Clang: The C and C++ compiler which is used to extract an AST from the provided +C source code. + +References +========== + +.. [1] https://github.com/sympy/sympy/issues +.. [2] https://clang.llvm.org/docs/ +.. [3] https://clang.llvm.org/docs/IntroductionToTheClangAST.html + +""" + +if cin: + from sympy.codegen.ast import (Variable, Integer, Float, + FunctionPrototype, FunctionDefinition, FunctionCall, + none, Return, Assignment, intc, int8, int16, int64, + uint8, uint16, uint32, uint64, float32, float64, float80, + aug_assign, bool_, While, CodeBlock) + from sympy.codegen.cnodes import (PreDecrement, PostDecrement, + PreIncrement, PostIncrement) + from sympy.core import Add, Mod, Mul, Pow, Rel + from sympy.logic.boolalg import And, as_Boolean, Not, Or + from sympy.core.symbol import Symbol + from sympy.core.sympify import sympify + from sympy.logic.boolalg import (false, true) + import sys + import tempfile + + class BaseParser: + """Base Class for the C parser""" + + def __init__(self): + """Initializes the Base parser creating a Clang AST index""" + self.index = cin.Index.create() + + def diagnostics(self, out): + """Diagostics function for the Clang AST""" + for diag in self.tu.diagnostics: + # tu = translation unit + print('%s %s (line %s, col %s) %s' % ( + { + 4: 'FATAL', + 3: 'ERROR', + 2: 'WARNING', + 1: 'NOTE', + 0: 'IGNORED', + }[diag.severity], + diag.location.file, + diag.location.line, + diag.location.column, + diag.spelling + ), file=out) + + class CCodeConverter(BaseParser): + """The Code Convereter for Clang AST + + The converter object takes the C source code or file as input and + converts them to SymPy Expressions. + """ + + def __init__(self): + """Initializes the code converter""" + super().__init__() + self._py_nodes = [] + self._data_types = { + "void": { + cin.TypeKind.VOID: none + }, + "bool": { + cin.TypeKind.BOOL: bool_ + }, + "int": { + cin.TypeKind.SCHAR: int8, + cin.TypeKind.SHORT: int16, + cin.TypeKind.INT: intc, + cin.TypeKind.LONG: int64, + cin.TypeKind.UCHAR: uint8, + cin.TypeKind.USHORT: uint16, + cin.TypeKind.UINT: uint32, + cin.TypeKind.ULONG: uint64 + }, + "float": { + cin.TypeKind.FLOAT: float32, + cin.TypeKind.DOUBLE: float64, + cin.TypeKind.LONGDOUBLE: float80 + } + } + + def parse(self, filename, flags): + """Function to parse a file with C source code + + It takes the filename as an attribute and creates a Clang AST + Translation Unit parsing the file. + Then the transformation function is called on the translation unit, + whose results are collected into a list which is returned by the + function. + + Parameters + ========== + + filename : string + Path to the C file to be parsed + + flags: list + Arguments to be passed to Clang while parsing the C code + + Returns + ======= + + py_nodes: list + A list of SymPy AST nodes + + """ + filepath = os.path.abspath(filename) + self.tu = self.index.parse( + filepath, + args=flags, + options=cin.TranslationUnit.PARSE_DETAILED_PROCESSING_RECORD + ) + for child in self.tu.cursor.get_children(): + if child.kind == cin.CursorKind.VAR_DECL or child.kind == cin.CursorKind.FUNCTION_DECL: + self._py_nodes.append(self.transform(child)) + return self._py_nodes + + def parse_str(self, source, flags): + """Function to parse a string with C source code + + It takes the source code as an attribute, stores it in a temporary + file and creates a Clang AST Translation Unit parsing the file. + Then the transformation function is called on the translation unit, + whose results are collected into a list which is returned by the + function. + + Parameters + ========== + + source : string + A string containing the C source code to be parsed + + flags: list + Arguments to be passed to Clang while parsing the C code + + Returns + ======= + + py_nodes: list + A list of SymPy AST nodes + + """ + file = tempfile.NamedTemporaryFile(mode = 'w+', suffix = '.cpp') + file.write(source) + file.flush() + file.seek(0) + self.tu = self.index.parse( + file.name, + args=flags, + options=cin.TranslationUnit.PARSE_DETAILED_PROCESSING_RECORD + ) + file.close() + for child in self.tu.cursor.get_children(): + if child.kind == cin.CursorKind.VAR_DECL or child.kind == cin.CursorKind.FUNCTION_DECL: + self._py_nodes.append(self.transform(child)) + return self._py_nodes + + def transform(self, node): + """Transformation Function for Clang AST nodes + + It determines the kind of node and calls the respective + transformation function for that node. + + Raises + ====== + + NotImplementedError : if the transformation for the provided node + is not implemented + + """ + handler = getattr(self, 'transform_%s' % node.kind.name.lower(), None) + + if handler is None: + print( + "Ignoring node of type %s (%s)" % ( + node.kind, + ' '.join( + t.spelling for t in node.get_tokens()) + ), + file=sys.stderr + ) + + return handler(node) + + def transform_var_decl(self, node): + """Transformation Function for Variable Declaration + + Used to create nodes for variable declarations and assignments with + values or function call for the respective nodes in the clang AST + + Returns + ======= + + A variable node as Declaration, with the initial value if given + + Raises + ====== + + NotImplementedError : if called for data types not currently + implemented + + Notes + ===== + + The function currently supports following data types: + + Boolean: + bool, _Bool + + Integer: + 8-bit: signed char and unsigned char + 16-bit: short, short int, signed short, + signed short int, unsigned short, unsigned short int + 32-bit: int, signed int, unsigned int + 64-bit: long, long int, signed long, + signed long int, unsigned long, unsigned long int + + Floating point: + Single Precision: float + Double Precision: double + Extended Precision: long double + + """ + if node.type.kind in self._data_types["int"]: + type = self._data_types["int"][node.type.kind] + elif node.type.kind in self._data_types["float"]: + type = self._data_types["float"][node.type.kind] + elif node.type.kind in self._data_types["bool"]: + type = self._data_types["bool"][node.type.kind] + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + try: + children = node.get_children() + child = next(children) + + #ignoring namespace and type details for the variable + while child.kind == cin.CursorKind.NAMESPACE_REF or child.kind == cin.CursorKind.TYPE_REF: + child = next(children) + + val = self.transform(child) + + supported_rhs = [ + cin.CursorKind.INTEGER_LITERAL, + cin.CursorKind.FLOATING_LITERAL, + cin.CursorKind.UNEXPOSED_EXPR, + cin.CursorKind.BINARY_OPERATOR, + cin.CursorKind.PAREN_EXPR, + cin.CursorKind.UNARY_OPERATOR, + cin.CursorKind.CXX_BOOL_LITERAL_EXPR + ] + + if child.kind in supported_rhs: + if isinstance(val, str): + value = Symbol(val) + elif isinstance(val, bool): + if node.type.kind in self._data_types["int"]: + value = Integer(0) if val == False else Integer(1) + elif node.type.kind in self._data_types["float"]: + value = Float(0.0) if val == False else Float(1.0) + elif node.type.kind in self._data_types["bool"]: + value = sympify(val) + elif isinstance(val, (Integer, int, Float, float)): + if node.type.kind in self._data_types["int"]: + value = Integer(val) + elif node.type.kind in self._data_types["float"]: + value = Float(val) + elif node.type.kind in self._data_types["bool"]: + value = sympify(bool(val)) + else: + value = val + + return Variable( + node.spelling + ).as_Declaration( + type = type, + value = value + ) + + elif child.kind == cin.CursorKind.CALL_EXPR: + return Variable( + node.spelling + ).as_Declaration( + value = val + ) + + else: + raise NotImplementedError("Given " + "variable declaration \"{}\" " + "is not possible to parse yet!" + .format(" ".join( + t.spelling for t in node.get_tokens() + ) + )) + + except StopIteration: + return Variable( + node.spelling + ).as_Declaration( + type = type + ) + + def transform_function_decl(self, node): + """Transformation Function For Function Declaration + + Used to create nodes for function declarations and definitions for + the respective nodes in the clang AST + + Returns + ======= + + function : Codegen AST node + - FunctionPrototype node if function body is not present + - FunctionDefinition node if the function body is present + + + """ + + if node.result_type.kind in self._data_types["int"]: + ret_type = self._data_types["int"][node.result_type.kind] + elif node.result_type.kind in self._data_types["float"]: + ret_type = self._data_types["float"][node.result_type.kind] + elif node.result_type.kind in self._data_types["bool"]: + ret_type = self._data_types["bool"][node.result_type.kind] + elif node.result_type.kind in self._data_types["void"]: + ret_type = self._data_types["void"][node.result_type.kind] + else: + raise NotImplementedError("Only void, bool, int " + "and float are supported") + body = [] + param = [] + + # Subsequent nodes will be the parameters for the function. + for child in node.get_children(): + decl = self.transform(child) + if child.kind == cin.CursorKind.PARM_DECL: + param.append(decl) + elif child.kind == cin.CursorKind.COMPOUND_STMT: + for val in decl: + body.append(val) + else: + body.append(decl) + + if body == []: + function = FunctionPrototype( + return_type = ret_type, + name = node.spelling, + parameters = param + ) + else: + function = FunctionDefinition( + return_type = ret_type, + name = node.spelling, + parameters = param, + body = body + ) + return function + + def transform_parm_decl(self, node): + """Transformation function for Parameter Declaration + + Used to create parameter nodes for the required functions for the + respective nodes in the clang AST + + Returns + ======= + + param : Codegen AST Node + Variable node with the value and type of the variable + + Raises + ====== + + ValueError if multiple children encountered in the parameter node + + """ + if node.type.kind in self._data_types["int"]: + type = self._data_types["int"][node.type.kind] + elif node.type.kind in self._data_types["float"]: + type = self._data_types["float"][node.type.kind] + elif node.type.kind in self._data_types["bool"]: + type = self._data_types["bool"][node.type.kind] + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + try: + children = node.get_children() + child = next(children) + + # Any namespace nodes can be ignored + while child.kind in [cin.CursorKind.NAMESPACE_REF, + cin.CursorKind.TYPE_REF, + cin.CursorKind.TEMPLATE_REF]: + child = next(children) + + # If there is a child, it is the default value of the parameter. + lit = self.transform(child) + if node.type.kind in self._data_types["int"]: + val = Integer(lit) + elif node.type.kind in self._data_types["float"]: + val = Float(lit) + elif node.type.kind in self._data_types["bool"]: + val = sympify(bool(lit)) + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + + param = Variable( + node.spelling + ).as_Declaration( + type = type, + value = val + ) + except StopIteration: + param = Variable( + node.spelling + ).as_Declaration( + type = type + ) + + try: + self.transform(next(children)) + raise ValueError("Can't handle multiple children on parameter") + except StopIteration: + pass + + return param + + def transform_integer_literal(self, node): + """Transformation function for integer literal + + Used to get the value and type of the given integer literal. + + Returns + ======= + + val : list + List with two arguments type and Value + type contains the type of the integer + value contains the value stored in the variable + + Notes + ===== + + Only Base Integer type supported for now + + """ + try: + value = next(node.get_tokens()).spelling + except StopIteration: + # No tokens + value = node.literal + return int(value) + + def transform_floating_literal(self, node): + """Transformation function for floating literal + + Used to get the value and type of the given floating literal. + + Returns + ======= + + val : list + List with two arguments type and Value + type contains the type of float + value contains the value stored in the variable + + Notes + ===== + + Only Base Float type supported for now + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + # No tokens + value = node.literal + return float(value) + + def transform_string_literal(self, node): + #TODO: No string type in AST + #type = + #try: + # value = next(node.get_tokens()).spelling + #except (StopIteration, ValueError): + # No tokens + # value = node.literal + #val = [type, value] + #return val + pass + + def transform_character_literal(self, node): + """Transformation function for character literal + + Used to get the value of the given character literal. + + Returns + ======= + + val : int + val contains the ascii value of the character literal + + Notes + ===== + + Only for cases where character is assigned to a integer value, + since character literal is not in SymPy AST + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + # No tokens + value = node.literal + return ord(str(value[1])) + + def transform_cxx_bool_literal_expr(self, node): + """Transformation function for boolean literal + + Used to get the value of the given boolean literal. + + Returns + ======= + + value : bool + value contains the boolean value of the variable + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + value = node.literal + return True if value == 'true' else False + + def transform_unexposed_decl(self,node): + """Transformation function for unexposed declarations""" + pass + + def transform_unexposed_expr(self, node): + """Transformation function for unexposed expression + + Unexposed expressions are used to wrap float, double literals and + expressions + + Returns + ======= + + expr : Codegen AST Node + the result from the wrapped expression + + None : NoneType + No children are found for the node + + Raises + ====== + + ValueError if the expression contains multiple children + + """ + # Ignore unexposed nodes; pass whatever is the first + # (and should be only) child unaltered. + try: + children = node.get_children() + expr = self.transform(next(children)) + except StopIteration: + return None + + try: + next(children) + raise ValueError("Unexposed expression has > 1 children.") + except StopIteration: + pass + + return expr + + def transform_decl_ref_expr(self, node): + """Returns the name of the declaration reference""" + return node.spelling + + def transform_call_expr(self, node): + """Transformation function for a call expression + + Used to create function call nodes for the function calls present + in the C code + + Returns + ======= + + FunctionCall : Codegen AST Node + FunctionCall node with parameters if any parameters are present + + """ + param = [] + children = node.get_children() + child = next(children) + + while child.kind == cin.CursorKind.NAMESPACE_REF: + child = next(children) + while child.kind == cin.CursorKind.TYPE_REF: + child = next(children) + + first_child = self.transform(child) + try: + for child in children: + arg = self.transform(child) + if child.kind == cin.CursorKind.INTEGER_LITERAL: + param.append(Integer(arg)) + elif child.kind == cin.CursorKind.FLOATING_LITERAL: + param.append(Float(arg)) + else: + param.append(arg) + return FunctionCall(first_child, param) + + except StopIteration: + return FunctionCall(first_child) + + def transform_return_stmt(self, node): + """Returns the Return Node for a return statement""" + return Return(next(node.get_children()).spelling) + + def transform_compound_stmt(self, node): + """Transformation function for compound statements + + Returns + ======= + + expr : list + list of Nodes for the expressions present in the statement + + None : NoneType + if the compound statement is empty + + """ + expr = [] + children = node.get_children() + + for child in children: + expr.append(self.transform(child)) + return expr + + def transform_decl_stmt(self, node): + """Transformation function for declaration statements + + These statements are used to wrap different kinds of declararions + like variable or function declaration + The function calls the transformer function for the child of the + given node + + Returns + ======= + + statement : Codegen AST Node + contains the node returned by the children node for the type of + declaration + + Raises + ====== + + ValueError if multiple children present + + """ + try: + children = node.get_children() + statement = self.transform(next(children)) + except StopIteration: + pass + + try: + self.transform(next(children)) + raise ValueError("Don't know how to handle multiple statements") + except StopIteration: + pass + + return statement + + def transform_paren_expr(self, node): + """Transformation function for Parenthesized expressions + + Returns the result from its children nodes + + """ + return self.transform(next(node.get_children())) + + def transform_compound_assignment_operator(self, node): + """Transformation function for handling shorthand operators + + Returns + ======= + + augmented_assignment_expression: Codegen AST node + shorthand assignment expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If the shorthand operator for bitwise operators + (~=, ^=, &=, |=, <<=, >>=) is encountered + + """ + return self.transform_binary_operator(node) + + def transform_unary_operator(self, node): + """Transformation function for handling unary operators + + Returns + ======= + + unary_expression: Codegen AST node + simplified unary expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If dereferencing operator(*), address operator(&) or + bitwise NOT operator(~) is encountered + + """ + # supported operators list + operators_list = ['+', '-', '++', '--', '!'] + tokens = list(node.get_tokens()) + + # it can be either pre increment/decrement or any other operator from the list + if tokens[0].spelling in operators_list: + child = self.transform(next(node.get_children())) + # (decl_ref) e.g.; int a = ++b; or simply ++b; + if isinstance(child, str): + if tokens[0].spelling == '+': + return Symbol(child) + if tokens[0].spelling == '-': + return Mul(Symbol(child), -1) + if tokens[0].spelling == '++': + return PreIncrement(Symbol(child)) + if tokens[0].spelling == '--': + return PreDecrement(Symbol(child)) + if tokens[0].spelling == '!': + return Not(Symbol(child)) + # e.g.; int a = -1; or int b = -(1 + 2); + else: + if tokens[0].spelling == '+': + return child + if tokens[0].spelling == '-': + return Mul(child, -1) + if tokens[0].spelling == '!': + return Not(sympify(bool(child))) + + # it can be either post increment/decrement + # since variable name is obtained in token[0].spelling + elif tokens[1].spelling in ['++', '--']: + child = self.transform(next(node.get_children())) + if tokens[1].spelling == '++': + return PostIncrement(Symbol(child)) + if tokens[1].spelling == '--': + return PostDecrement(Symbol(child)) + else: + raise NotImplementedError("Dereferencing operator, " + "Address operator and bitwise NOT operator " + "have not been implemented yet!") + + def transform_binary_operator(self, node): + """Transformation function for handling binary operators + + Returns + ======= + + binary_expression: Codegen AST node + simplified binary expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If a bitwise operator or + unary operator(which is a child of any binary + operator in Clang AST) is encountered + + """ + # get all the tokens of assignment + # and store it in the tokens list + tokens = list(node.get_tokens()) + + # supported operators list + operators_list = ['+', '-', '*', '/', '%','=', + '>', '>=', '<', '<=', '==', '!=', '&&', '||', '+=', '-=', + '*=', '/=', '%='] + + # this stack will contain variable content + # and type of variable in the rhs + combined_variables_stack = [] + + # this stack will contain operators + # to be processed in the rhs + operators_stack = [] + + # iterate through every token + for token in tokens: + # token is either '(', ')' or + # any of the supported operators from the operator list + if token.kind == cin.TokenKind.PUNCTUATION: + + # push '(' to the operators stack + if token.spelling == '(': + operators_stack.append('(') + + elif token.spelling == ')': + # keep adding the expression to the + # combined variables stack unless + # '(' is found + while (operators_stack + and operators_stack[-1] != '('): + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation( + lhs, rhs, operator)) + + # pop '(' + operators_stack.pop() + + # token is an operator (supported) + elif token.spelling in operators_list: + while (operators_stack + and self.priority_of(token.spelling) + <= self.priority_of( + operators_stack[-1])): + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation( + lhs, rhs, operator)) + + # push current operator + operators_stack.append(token.spelling) + + # token is a bitwise operator + elif token.spelling in ['&', '|', '^', '<<', '>>']: + raise NotImplementedError( + "Bitwise operator has not been " + "implemented yet!") + + # token is a shorthand bitwise operator + elif token.spelling in ['&=', '|=', '^=', '<<=', + '>>=']: + raise NotImplementedError( + "Shorthand bitwise operator has not been " + "implemented yet!") + else: + raise NotImplementedError( + "Given token {} is not implemented yet!" + .format(token.spelling)) + + # token is an identifier(variable) + elif token.kind == cin.TokenKind.IDENTIFIER: + combined_variables_stack.append( + [token.spelling, 'identifier']) + + # token is a literal + elif token.kind == cin.TokenKind.LITERAL: + combined_variables_stack.append( + [token.spelling, 'literal']) + + # token is a keyword, either true or false + elif (token.kind == cin.TokenKind.KEYWORD + and token.spelling in ['true', 'false']): + combined_variables_stack.append( + [token.spelling, 'boolean']) + else: + raise NotImplementedError( + "Given token {} is not implemented yet!" + .format(token.spelling)) + + # process remaining operators + while operators_stack: + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation(lhs, rhs, operator)) + + return combined_variables_stack[-1][0] + + def priority_of(self, op): + """To get the priority of given operator""" + if op in ['=', '+=', '-=', '*=', '/=', '%=']: + return 1 + if op in ['&&', '||']: + return 2 + if op in ['<', '<=', '>', '>=', '==', '!=']: + return 3 + if op in ['+', '-']: + return 4 + if op in ['*', '/', '%']: + return 5 + return 0 + + def perform_operation(self, lhs, rhs, op): + """Performs operation supported by the SymPy core + + Returns + ======= + + combined_variable: list + contains variable content and type of variable + + """ + lhs_value = self.get_expr_for_operand(lhs) + rhs_value = self.get_expr_for_operand(rhs) + if op == '+': + return [Add(lhs_value, rhs_value), 'expr'] + if op == '-': + return [Add(lhs_value, -rhs_value), 'expr'] + if op == '*': + return [Mul(lhs_value, rhs_value), 'expr'] + if op == '/': + return [Mul(lhs_value, Pow(rhs_value, Integer(-1))), 'expr'] + if op == '%': + return [Mod(lhs_value, rhs_value), 'expr'] + if op in ['<', '<=', '>', '>=', '==', '!=']: + return [Rel(lhs_value, rhs_value, op), 'expr'] + if op == '&&': + return [And(as_Boolean(lhs_value), as_Boolean(rhs_value)), 'expr'] + if op == '||': + return [Or(as_Boolean(lhs_value), as_Boolean(rhs_value)), 'expr'] + if op == '=': + return [Assignment(Variable(lhs_value), rhs_value), 'expr'] + if op in ['+=', '-=', '*=', '/=', '%=']: + return [aug_assign(Variable(lhs_value), op[0], rhs_value), 'expr'] + + def get_expr_for_operand(self, combined_variable): + """Gives out SymPy Codegen AST node + + AST node returned is corresponding to + combined variable passed.Combined variable contains + variable content and type of variable + + """ + if combined_variable[1] == 'identifier': + return Symbol(combined_variable[0]) + if combined_variable[1] == 'literal': + if '.' in combined_variable[0]: + return Float(float(combined_variable[0])) + else: + return Integer(int(combined_variable[0])) + if combined_variable[1] == 'expr': + return combined_variable[0] + if combined_variable[1] == 'boolean': + return true if combined_variable[0] == 'true' else false + + def transform_null_stmt(self, node): + """Handles Null Statement and returns None""" + return none + + def transform_while_stmt(self, node): + """Transformation function for handling while statement + + Returns + ======= + + while statement : Codegen AST Node + contains the while statement node having condition and + statement block + + """ + children = node.get_children() + + condition = self.transform(next(children)) + statements = self.transform(next(children)) + + if isinstance(statements, list): + statement_block = CodeBlock(*statements) + else: + statement_block = CodeBlock(statements) + + return While(condition, statement_block) + + + +else: + class CCodeConverter(): # type: ignore + def __init__(self, *args, **kwargs): + raise ImportError("Module not Installed") + + +def parse_c(source): + """Function for converting a C source code + + The function reads the source code present in the given file and parses it + to give out SymPy Expressions + + Returns + ======= + + src : list + List of Python expression strings + + """ + converter = CCodeConverter() + if os.path.exists(source): + src = converter.parse(source, flags = []) + else: + src = converter.parse_str(source, flags = []) + return src diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..c65e37cf3de2dddbcee0fa5c7eeac2fdc9f685db --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py @@ -0,0 +1 @@ +"""Used for translating Fortran source code into a SymPy expression. """ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..504249f6119a59a90d91c5e989f893cffe20e643 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py @@ -0,0 +1,347 @@ +from sympy.external import import_module + +lfortran = import_module('lfortran') + +if lfortran: + from sympy.codegen.ast import (Variable, IntBaseType, FloatBaseType, String, + Return, FunctionDefinition, Assignment) + from sympy.core import Add, Mul, Integer, Float + from sympy.core.symbol import Symbol + + asr_mod = lfortran.asr + asr = lfortran.asr.asr + src_to_ast = lfortran.ast.src_to_ast + ast_to_asr = lfortran.semantic.ast_to_asr.ast_to_asr + + """ + This module contains all the necessary Classes and Function used to Parse + Fortran code into SymPy expression + + The module and its API are currently under development and experimental. + It is also dependent on LFortran for the ASR that is converted to SymPy syntax + which is also under development. + The module only supports the features currently supported by the LFortran ASR + which will be updated as the development of LFortran and this module progresses + + You might find unexpected bugs and exceptions while using the module, feel free + to report them to the SymPy Issue Tracker + + The API for the module might also change while in development if better and + more effective ways are discovered for the process + + Features Supported + ================== + + - Variable Declarations (integers and reals) + - Function Definitions + - Assignments and Basic Binary Operations + + + Notes + ===== + + The module depends on an external dependency + + LFortran : Required to parse Fortran source code into ASR + + + References + ========== + + .. [1] https://github.com/sympy/sympy/issues + .. [2] https://gitlab.com/lfortran/lfortran + .. [3] https://docs.lfortran.org/ + + """ + + + class ASR2PyVisitor(asr.ASTVisitor): # type: ignore + """ + Visitor Class for LFortran ASR + + It is a Visitor class derived from asr.ASRVisitor which visits all the + nodes of the LFortran ASR and creates corresponding AST node for each + ASR node + + """ + + def __init__(self): + """Initialize the Parser""" + self._py_ast = [] + + def visit_TranslationUnit(self, node): + """ + Function to visit all the elements of the Translation Unit + created by LFortran ASR + """ + for s in node.global_scope.symbols: + sym = node.global_scope.symbols[s] + self.visit(sym) + for item in node.items: + self.visit(item) + + def visit_Assignment(self, node): + """Visitor Function for Assignment + + Visits each Assignment is the LFortran ASR and creates corresponding + assignment for SymPy. + + Notes + ===== + + The function currently only supports variable assignment and binary + operation assignments of varying multitudes. Any type of numberS or + array is not supported. + + Raises + ====== + + NotImplementedError() when called for Numeric assignments or Arrays + + """ + # TODO: Arithmetic Assignment + if isinstance(node.target, asr.Variable): + target = node.target + value = node.value + if isinstance(value, asr.Variable): + new_node = Assignment( + Variable( + target.name + ), + Variable( + value.name + ) + ) + elif (type(value) == asr.BinOp): + exp_ast = call_visitor(value) + for expr in exp_ast: + new_node = Assignment( + Variable(target.name), + expr + ) + else: + raise NotImplementedError("Numeric assignments not supported") + else: + raise NotImplementedError("Arrays not supported") + self._py_ast.append(new_node) + + def visit_BinOp(self, node): + """Visitor Function for Binary Operations + + Visits each binary operation present in the LFortran ASR like addition, + subtraction, multiplication, division and creates the corresponding + operation node in SymPy's AST + + In case of more than one binary operations, the function calls the + call_visitor() function on the child nodes of the binary operations + recursively until all the operations have been processed. + + Notes + ===== + + The function currently only supports binary operations with Variables + or other binary operations. Numerics are not supported as of yet. + + Raises + ====== + + NotImplementedError() when called for Numeric assignments + + """ + # TODO: Integer Binary Operations + op = node.op + lhs = node.left + rhs = node.right + + if (type(lhs) == asr.Variable): + left_value = Symbol(lhs.name) + elif(type(lhs) == asr.BinOp): + l_exp_ast = call_visitor(lhs) + for exp in l_exp_ast: + left_value = exp + else: + raise NotImplementedError("Numbers Currently not supported") + + if (type(rhs) == asr.Variable): + right_value = Symbol(rhs.name) + elif(type(rhs) == asr.BinOp): + r_exp_ast = call_visitor(rhs) + for exp in r_exp_ast: + right_value = exp + else: + raise NotImplementedError("Numbers Currently not supported") + + if isinstance(op, asr.Add): + new_node = Add(left_value, right_value) + elif isinstance(op, asr.Sub): + new_node = Add(left_value, -right_value) + elif isinstance(op, asr.Div): + new_node = Mul(left_value, 1/right_value) + elif isinstance(op, asr.Mul): + new_node = Mul(left_value, right_value) + + self._py_ast.append(new_node) + + def visit_Variable(self, node): + """Visitor Function for Variable Declaration + + Visits each variable declaration present in the ASR and creates a + Symbol declaration for each variable + + Notes + ===== + + The functions currently only support declaration of integer and + real variables. Other data types are still under development. + + Raises + ====== + + NotImplementedError() when called for unsupported data types + + """ + if isinstance(node.type, asr.Integer): + var_type = IntBaseType(String('integer')) + value = Integer(0) + elif isinstance(node.type, asr.Real): + var_type = FloatBaseType(String('real')) + value = Float(0.0) + else: + raise NotImplementedError("Data type not supported") + + if not (node.intent == 'in'): + new_node = Variable( + node.name + ).as_Declaration( + type = var_type, + value = value + ) + self._py_ast.append(new_node) + + def visit_Sequence(self, seq): + """Visitor Function for code sequence + + Visits a code sequence/ block and calls the visitor function on all the + children of the code block to create corresponding code in python + + """ + if seq is not None: + for node in seq: + self._py_ast.append(call_visitor(node)) + + def visit_Num(self, node): + """Visitor Function for Numbers in ASR + + This function is currently under development and will be updated + with improvements in the LFortran ASR + + """ + # TODO:Numbers when the LFortran ASR is updated + # self._py_ast.append(Integer(node.n)) + pass + + def visit_Function(self, node): + """Visitor Function for function Definitions + + Visits each function definition present in the ASR and creates a + function definition node in the Python AST with all the elements of the + given function + + The functions declare all the variables required as SymPy symbols in + the function before the function definition + + This function also the call_visior_function to parse the contents of + the function body + + """ + # TODO: Return statement, variable declaration + fn_args = [Variable(arg_iter.name) for arg_iter in node.args] + fn_body = [] + fn_name = node.name + for i in node.body: + fn_ast = call_visitor(i) + try: + fn_body_expr = fn_ast + except UnboundLocalError: + fn_body_expr = [] + for sym in node.symtab.symbols: + decl = call_visitor(node.symtab.symbols[sym]) + for symbols in decl: + fn_body.append(symbols) + for elem in fn_body_expr: + fn_body.append(elem) + fn_body.append( + Return( + Variable( + node.return_var.name + ) + ) + ) + if isinstance(node.return_var.type, asr.Integer): + ret_type = IntBaseType(String('integer')) + elif isinstance(node.return_var.type, asr.Real): + ret_type = FloatBaseType(String('real')) + else: + raise NotImplementedError("Data type not supported") + new_node = FunctionDefinition( + return_type = ret_type, + name = fn_name, + parameters = fn_args, + body = fn_body + ) + self._py_ast.append(new_node) + + def ret_ast(self): + """Returns the AST nodes""" + return self._py_ast +else: + class ASR2PyVisitor(): # type: ignore + def __init__(self, *args, **kwargs): + raise ImportError('lfortran not available') + +def call_visitor(fort_node): + """Calls the AST Visitor on the Module + + This function is used to call the AST visitor for a program or module + It imports all the required modules and calls the visit() function + on the given node + + Parameters + ========== + + fort_node : LFortran ASR object + Node for the operation for which the NodeVisitor is called + + Returns + ======= + + res_ast : list + list of SymPy AST Nodes + + """ + v = ASR2PyVisitor() + v.visit(fort_node) + res_ast = v.ret_ast() + return res_ast + + +def src_to_sympy(src): + """Wrapper function to convert the given Fortran source code to SymPy Expressions + + Parameters + ========== + + src : string + A string with the Fortran source code + + Returns + ======= + + py_src : string + A string with the Python source code compatible with SymPy + + """ + a_ast = src_to_ast(src, translation_unit=False) + a = ast_to_asr(a_ast) + py_src = call_visitor(a) + return py_src diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt new file mode 100644 index 0000000000000000000000000000000000000000..6bbfda911b2afada41a568218e31a6502dc68f44 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt @@ -0,0 +1,21 @@ +The MIT License (MIT) + +Copyright 2016, latex2sympy + +Permission is hereby granted, free of charge, to any person obtaining a copy +of this software and associated documentation files (the "Software"), to deal +in the Software without restriction, including without limitation the rights +to use, copy, modify, merge, publish, distribute, sublicense, and/or sell +copies of the Software, and to permit persons to whom the Software is +furnished to do so, subject to the following conditions: + +The above copyright notice and this permission notice shall be included in all +copies or substantial portions of the Software. + +THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR +IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, +FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE +AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER +LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, +OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE +SOFTWARE. diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 new file mode 100644 index 0000000000000000000000000000000000000000..fc2c30f9817931e2060b549a39f98a6a4f9cb1f7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 @@ -0,0 +1,312 @@ +/* + ANTLR4 LaTeX Math Grammar + + Ported from latex2sympy by @augustt198 https://github.com/augustt198/latex2sympy See license in + LICENSE.txt + */ + +/* + After changing this file, it is necessary to run `python setup.py antlr` in the root directory of + the repository. This will regenerate the code in `sympy/parsing/latex/_antlr/*.py`. + */ + +grammar LaTeX; + +options { + language = Python3; +} + +WS: [ \t\r\n]+ -> skip; +THINSPACE: ('\\,' | '\\thinspace') -> skip; +MEDSPACE: ('\\:' | '\\medspace') -> skip; +THICKSPACE: ('\\;' | '\\thickspace') -> skip; +QUAD: '\\quad' -> skip; +QQUAD: '\\qquad' -> skip; +NEGTHINSPACE: ('\\!' | '\\negthinspace') -> skip; +NEGMEDSPACE: '\\negmedspace' -> skip; +NEGTHICKSPACE: '\\negthickspace' -> skip; +CMD_LEFT: '\\left' -> skip; +CMD_RIGHT: '\\right' -> skip; + +IGNORE: + ( + '\\vrule' + | '\\vcenter' + | '\\vbox' + | '\\vskip' + | '\\vspace' + | '\\hfil' + | '\\*' + | '\\-' + | '\\.' + | '\\/' + | '\\"' + | '\\(' + | '\\=' + ) -> skip; + +ADD: '+'; +SUB: '-'; +MUL: '*'; +DIV: '/'; + +L_PAREN: '('; +R_PAREN: ')'; +L_BRACE: '{'; +R_BRACE: '}'; +L_BRACE_LITERAL: '\\{'; +R_BRACE_LITERAL: '\\}'; +L_BRACKET: '['; +R_BRACKET: ']'; + +BAR: '|'; + +R_BAR: '\\right|'; +L_BAR: '\\left|'; + +L_ANGLE: '\\langle'; +R_ANGLE: '\\rangle'; +FUNC_LIM: '\\lim'; +LIM_APPROACH_SYM: + '\\to' + | '\\rightarrow' + | '\\Rightarrow' + | '\\longrightarrow' + | '\\Longrightarrow'; +FUNC_INT: + '\\int' + | '\\int\\limits'; +FUNC_SUM: '\\sum'; +FUNC_PROD: '\\prod'; + +FUNC_EXP: '\\exp'; +FUNC_LOG: '\\log'; +FUNC_LG: '\\lg'; +FUNC_LN: '\\ln'; +FUNC_SIN: '\\sin'; +FUNC_COS: '\\cos'; +FUNC_TAN: '\\tan'; +FUNC_CSC: '\\csc'; +FUNC_SEC: '\\sec'; +FUNC_COT: '\\cot'; + +FUNC_ARCSIN: '\\arcsin'; +FUNC_ARCCOS: '\\arccos'; +FUNC_ARCTAN: '\\arctan'; +FUNC_ARCCSC: '\\arccsc'; +FUNC_ARCSEC: '\\arcsec'; +FUNC_ARCCOT: '\\arccot'; + +FUNC_SINH: '\\sinh'; +FUNC_COSH: '\\cosh'; +FUNC_TANH: '\\tanh'; +FUNC_ARSINH: '\\arsinh'; +FUNC_ARCOSH: '\\arcosh'; +FUNC_ARTANH: '\\artanh'; + +L_FLOOR: '\\lfloor'; +R_FLOOR: '\\rfloor'; +L_CEIL: '\\lceil'; +R_CEIL: '\\rceil'; + +FUNC_SQRT: '\\sqrt'; +FUNC_OVERLINE: '\\overline'; + +CMD_TIMES: '\\times'; +CMD_CDOT: '\\cdot'; +CMD_DIV: '\\div'; +CMD_FRAC: + '\\frac' + | '\\dfrac' + | '\\tfrac'; +CMD_BINOM: '\\binom'; +CMD_DBINOM: '\\dbinom'; +CMD_TBINOM: '\\tbinom'; + +CMD_MATHIT: '\\mathit'; + +UNDERSCORE: '_'; +CARET: '^'; +COLON: ':'; + +fragment WS_CHAR: [ \t\r\n]; +DIFFERENTIAL: 'd' WS_CHAR*? ([a-zA-Z] | '\\' [a-zA-Z]+); + +LETTER: [a-zA-Z]; +DIGIT: [0-9]; + +EQUAL: (('&' WS_CHAR*?)? '=') | ('=' (WS_CHAR*? '&')?); +NEQ: '\\neq'; + +LT: '<'; +LTE: ('\\leq' | '\\le' | LTE_Q | LTE_S); +LTE_Q: '\\leqq'; +LTE_S: '\\leqslant'; + +GT: '>'; +GTE: ('\\geq' | '\\ge' | GTE_Q | GTE_S); +GTE_Q: '\\geqq'; +GTE_S: '\\geqslant'; + +BANG: '!'; + +SINGLE_QUOTES: '\''+; + +SYMBOL: '\\' [a-zA-Z]+; + +math: relation; + +relation: + relation (EQUAL | LT | LTE | GT | GTE | NEQ) relation + | expr; + +equality: expr EQUAL expr; + +expr: additive; + +additive: additive (ADD | SUB) additive | mp; + +// mult part +mp: + mp (MUL | CMD_TIMES | CMD_CDOT | DIV | CMD_DIV | COLON) mp + | unary; + +mp_nofunc: + mp_nofunc ( + MUL + | CMD_TIMES + | CMD_CDOT + | DIV + | CMD_DIV + | COLON + ) mp_nofunc + | unary_nofunc; + +unary: (ADD | SUB) unary | postfix+; + +unary_nofunc: + (ADD | SUB) unary_nofunc + | postfix postfix_nofunc*; + +postfix: exp postfix_op*; +postfix_nofunc: exp_nofunc postfix_op*; +postfix_op: BANG | eval_at; + +eval_at: + BAR (eval_at_sup | eval_at_sub | eval_at_sup eval_at_sub); + +eval_at_sub: UNDERSCORE L_BRACE (expr | equality) R_BRACE; + +eval_at_sup: CARET L_BRACE (expr | equality) R_BRACE; + +exp: exp CARET (atom | L_BRACE expr R_BRACE) subexpr? | comp; + +exp_nofunc: + exp_nofunc CARET (atom | L_BRACE expr R_BRACE) subexpr? + | comp_nofunc; + +comp: + group + | abs_group + | func + | atom + | floor + | ceil; + +comp_nofunc: + group + | abs_group + | atom + | floor + | ceil; + +group: + L_PAREN expr R_PAREN + | L_BRACKET expr R_BRACKET + | L_BRACE expr R_BRACE + | L_BRACE_LITERAL expr R_BRACE_LITERAL; + +abs_group: BAR expr BAR; + +number: DIGIT+ (',' DIGIT DIGIT DIGIT)* ('.' DIGIT+)?; + +atom: (LETTER | SYMBOL) (subexpr? SINGLE_QUOTES? | SINGLE_QUOTES? subexpr?) + | number + | DIFFERENTIAL + | mathit + | frac + | binom + | bra + | ket; + +bra: L_ANGLE expr (R_BAR | BAR); +ket: (L_BAR | BAR) expr R_ANGLE; + +mathit: CMD_MATHIT L_BRACE mathit_text R_BRACE; +mathit_text: LETTER*; + +frac: CMD_FRAC (upperd = DIGIT | L_BRACE upper = expr R_BRACE) + (lowerd = DIGIT | L_BRACE lower = expr R_BRACE); + +binom: + (CMD_BINOM | CMD_DBINOM | CMD_TBINOM) L_BRACE n = expr R_BRACE L_BRACE k = expr R_BRACE; + +floor: L_FLOOR val = expr R_FLOOR; +ceil: L_CEIL val = expr R_CEIL; + +func_normal: + FUNC_EXP + | FUNC_LOG + | FUNC_LG + | FUNC_LN + | FUNC_SIN + | FUNC_COS + | FUNC_TAN + | FUNC_CSC + | FUNC_SEC + | FUNC_COT + | FUNC_ARCSIN + | FUNC_ARCCOS + | FUNC_ARCTAN + | FUNC_ARCCSC + | FUNC_ARCSEC + | FUNC_ARCCOT + | FUNC_SINH + | FUNC_COSH + | FUNC_TANH + | FUNC_ARSINH + | FUNC_ARCOSH + | FUNC_ARTANH; + +func: + func_normal (subexpr? supexpr? | supexpr? subexpr?) ( + L_PAREN func_arg R_PAREN + | func_arg_noparens + ) + | (LETTER | SYMBOL) (subexpr? SINGLE_QUOTES? | SINGLE_QUOTES? subexpr?) // e.g. f(x), f_1'(x) + L_PAREN args R_PAREN + | FUNC_INT (subexpr supexpr | supexpr subexpr)? ( + additive? DIFFERENTIAL + | frac + | additive + ) + | FUNC_SQRT (L_BRACKET root = expr R_BRACKET)? L_BRACE base = expr R_BRACE + | FUNC_OVERLINE L_BRACE base = expr R_BRACE + | (FUNC_SUM | FUNC_PROD) (subeq supexpr | supexpr subeq) mp + | FUNC_LIM limit_sub mp; + +args: (expr ',' args) | expr; + +limit_sub: + UNDERSCORE L_BRACE (LETTER | SYMBOL) LIM_APPROACH_SYM expr ( + CARET ((L_BRACE (ADD | SUB) R_BRACE) | ADD | SUB) + )? R_BRACE; + +func_arg: expr | (expr ',' func_arg); +func_arg_noparens: mp_nofunc; + +subexpr: UNDERSCORE (atom | L_BRACE expr R_BRACE); +supexpr: CARET (atom | L_BRACE expr R_BRACE); + +subeq: UNDERSCORE L_BRACE equality R_BRACE; +supeq: UNDERSCORE L_BRACE equality R_BRACE; diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..9466d37b8b06f1f292c73f975e44d21c96da10d1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py @@ -0,0 +1,204 @@ +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on +from re import compile as rcompile + +from sympy.parsing.latex.lark import LarkLaTeXParser, TransformToSymPyExpr, parse_latex_lark # noqa + +from .errors import LaTeXParsingError # noqa + + +IGNORE_L = r"\s*[{]*\s*" +IGNORE_R = r"\s*[}]*\s*" +NO_LEFT = r"(? len(latex_str): + e = len(latex_str) + eellipsis = "" + + if x[3] in END_DELIM_REPR: + err = (f"Extra '{x[2]}' at index {x[0]} or " + "missing corresponding " + f"'{BEGIN_DELIM_REPR[MATRIX_DELIMS_INV[x[3]]]}' " + f"in LaTeX string: {sellipsis}{latex_str[s:e]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + + if x[7] is None: + err = (f"Extra '{x[2]}' at index {x[0]} or " + "missing corresponding " + f"'{END_DELIM_REPR[MATRIX_DELIMS[x[3]]]}' " + f"in LaTeX string: {sellipsis}{latex_str[s:e]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + + correct_end_regex = MATRIX_DELIMS[x[3]] + sellipsis = "..." if x[0] > 0 else "" + eellipsis = "..." if x[5] < len(latex_str) else "" + if x[7] != correct_end_regex: + err = ("Expected " + f"'{END_DELIM_REPR[correct_end_regex]}' " + f"to close the '{x[2]}' at index {x[0]} but " + f"found '{x[6]}' at index {x[4]} of LaTeX " + f"string instead: {sellipsis}{latex_str[x[0]:x[5]]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + +__doctest_requires__ = {('parse_latex',): ['antlr4', 'lark']} + + +@doctest_depends_on(modules=('antlr4', 'lark')) +def parse_latex(s, strict=False, backend="antlr"): + r"""Converts the input LaTeX string ``s`` to a SymPy ``Expr``. + + Parameters + ========== + + s : str + The LaTeX string to parse. In Python source containing LaTeX, + *raw strings* (denoted with ``r"``, like this one) are preferred, + as LaTeX makes liberal use of the ``\`` character, which would + trigger escaping in normal Python strings. + backend : str, optional + Currently, there are two backends supported: ANTLR, and Lark. + The default setting is to use the ANTLR backend, which can be + changed to Lark if preferred. + + Use ``backend="antlr"`` for the ANTLR-based parser, and + ``backend="lark"`` for the Lark-based parser. + + The ``backend`` option is case-sensitive, and must be in + all lowercase. + strict : bool, optional + This option is only available with the ANTLR backend. + + If True, raise an exception if the string cannot be parsed as + valid LaTeX. If False, try to recover gracefully from common + mistakes. + + Examples + ======== + + >>> from sympy.parsing.latex import parse_latex + >>> expr = parse_latex(r"\frac {1 + \sqrt {\a}} {\b}") + >>> expr + (sqrt(a) + 1)/b + >>> expr.evalf(4, subs=dict(a=5, b=2)) + 1.618 + >>> func = parse_latex(r"\int_1^\alpha \dfrac{\mathrm{d}t}{t}", backend="lark") + >>> func.evalf(subs={"alpha": 2}) + 0.693147180559945 + """ + + check_matrix_delimiters(s) + + if backend == "antlr": + _latex = import_module( + 'sympy.parsing.latex._parse_latex_antlr', + import_kwargs={'fromlist': ['X']}) + + if _latex is not None: + return _latex.parse_latex(s, strict) + elif backend == "lark": + return parse_latex_lark(s) + else: + raise NotImplementedError(f"Using the '{backend}' backend in the LaTeX" \ + " parser is not supported.") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..2d690e1eb8631ee7731fc1875769d3a4704a1743 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py @@ -0,0 +1,9 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py new file mode 100644 index 0000000000000000000000000000000000000000..46ca959736c967782eef360b9b3268ccd0be0979 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py @@ -0,0 +1,512 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + + +def serializedATN(): + return [ + 4,0,91,911,6,-1,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5, + 2,6,7,6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2, + 13,7,13,2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7, + 19,2,20,7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2, + 26,7,26,2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7, + 32,2,33,7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2, + 39,7,39,2,40,7,40,2,41,7,41,2,42,7,42,2,43,7,43,2,44,7,44,2,45,7, + 45,2,46,7,46,2,47,7,47,2,48,7,48,2,49,7,49,2,50,7,50,2,51,7,51,2, + 52,7,52,2,53,7,53,2,54,7,54,2,55,7,55,2,56,7,56,2,57,7,57,2,58,7, + 58,2,59,7,59,2,60,7,60,2,61,7,61,2,62,7,62,2,63,7,63,2,64,7,64,2, + 65,7,65,2,66,7,66,2,67,7,67,2,68,7,68,2,69,7,69,2,70,7,70,2,71,7, + 71,2,72,7,72,2,73,7,73,2,74,7,74,2,75,7,75,2,76,7,76,2,77,7,77,2, + 78,7,78,2,79,7,79,2,80,7,80,2,81,7,81,2,82,7,82,2,83,7,83,2,84,7, + 84,2,85,7,85,2,86,7,86,2,87,7,87,2,88,7,88,2,89,7,89,2,90,7,90,2, + 91,7,91,1,0,1,0,1,1,1,1,1,2,4,2,191,8,2,11,2,12,2,192,1,2,1,2,1, + 3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,3,3,209,8,3,1,3,1, + 3,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,3,4,224,8,4,1,4,1, + 4,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,3,5,241,8, + 5,1,5,1,5,1,6,1,6,1,6,1,6,1,6,1,6,1,6,1,6,1,7,1,7,1,7,1,7,1,7,1, + 7,1,7,1,7,1,7,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1, + 8,1,8,1,8,3,8,277,8,8,1,8,1,8,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1, + 9,1,9,1,9,1,9,1,9,1,9,1,9,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10, + 1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,11,1,11,1,11,1,11, + 1,11,1,11,1,11,1,11,1,12,1,12,1,12,1,12,1,12,1,12,1,12,1,12,1,12, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,3,13, + 381,8,13,1,13,1,13,1,14,1,14,1,15,1,15,1,16,1,16,1,17,1,17,1,18, + 1,18,1,19,1,19,1,20,1,20,1,21,1,21,1,22,1,22,1,22,1,23,1,23,1,23, + 1,24,1,24,1,25,1,25,1,26,1,26,1,27,1,27,1,27,1,27,1,27,1,27,1,27, + 1,27,1,28,1,28,1,28,1,28,1,28,1,28,1,28,1,29,1,29,1,29,1,29,1,29, + 1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,30,1,30,1,30,1,30,1,31,1,31, + 1,31,1,31,1,31,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,3,32,504,8,32,1,33,1,33,1,33,1,33, + 1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,3,33,521, + 8,33,1,34,1,34,1,34,1,34,1,34,1,35,1,35,1,35,1,35,1,35,1,35,1,36, + 1,36,1,36,1,36,1,36,1,37,1,37,1,37,1,37,1,37,1,38,1,38,1,38,1,38, + 1,39,1,39,1,39,1,39,1,40,1,40,1,40,1,40,1,40,1,41,1,41,1,41,1,41, + 1,41,1,42,1,42,1,42,1,42,1,42,1,43,1,43,1,43,1,43,1,43,1,44,1,44, + 1,44,1,44,1,44,1,45,1,45,1,45,1,45,1,45,1,46,1,46,1,46,1,46,1,46, + 1,46,1,46,1,46,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,48,1,48, + 1,48,1,48,1,48,1,48,1,48,1,48,1,49,1,49,1,49,1,49,1,49,1,49,1,49, + 1,49,1,50,1,50,1,50,1,50,1,50,1,50,1,50,1,50,1,51,1,51,1,51,1,51, + 1,51,1,51,1,51,1,51,1,52,1,52,1,52,1,52,1,52,1,52,1,53,1,53,1,53, + 1,53,1,53,1,53,1,54,1,54,1,54,1,54,1,54,1,54,1,55,1,55,1,55,1,55, + 1,55,1,55,1,55,1,55,1,56,1,56,1,56,1,56,1,56,1,56,1,56,1,56,1,57, + 1,57,1,57,1,57,1,57,1,57,1,57,1,57,1,58,1,58,1,58,1,58,1,58,1,58, + 1,58,1,58,1,59,1,59,1,59,1,59,1,59,1,59,1,59,1,59,1,60,1,60,1,60, + 1,60,1,60,1,60,1,60,1,61,1,61,1,61,1,61,1,61,1,61,1,61,1,62,1,62, + 1,62,1,62,1,62,1,62,1,63,1,63,1,63,1,63,1,63,1,63,1,63,1,63,1,63, + 1,63,1,64,1,64,1,64,1,64,1,64,1,64,1,64,1,65,1,65,1,65,1,65,1,65, + 1,65,1,66,1,66,1,66,1,66,1,66,1,67,1,67,1,67,1,67,1,67,1,67,1,67, + 1,67,1,67,1,67,1,67,1,67,1,67,1,67,1,67,1,67,1,67,3,67,753,8,67, + 1,68,1,68,1,68,1,68,1,68,1,68,1,68,1,69,1,69,1,69,1,69,1,69,1,69, + 1,69,1,69,1,70,1,70,1,70,1,70,1,70,1,70,1,70,1,70,1,71,1,71,1,71, + 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170,1,0,0,0,869,870,5,62,0,0,870,172,1,0,0,0,871,872,5,92,0,0,872, + 873,5,103,0,0,873,874,5,101,0,0,874,881,5,113,0,0,875,876,5,92,0, + 0,876,877,5,103,0,0,877,881,5,101,0,0,878,881,3,175,87,0,879,881, + 3,177,88,0,880,871,1,0,0,0,880,875,1,0,0,0,880,878,1,0,0,0,880,879, + 1,0,0,0,881,174,1,0,0,0,882,883,5,92,0,0,883,884,5,103,0,0,884,885, + 5,101,0,0,885,886,5,113,0,0,886,887,5,113,0,0,887,176,1,0,0,0,888, + 889,5,92,0,0,889,890,5,103,0,0,890,891,5,101,0,0,891,892,5,113,0, + 0,892,893,5,115,0,0,893,894,5,108,0,0,894,895,5,97,0,0,895,896,5, + 110,0,0,896,897,5,116,0,0,897,178,1,0,0,0,898,899,5,33,0,0,899,180, + 1,0,0,0,900,902,5,39,0,0,901,900,1,0,0,0,902,903,1,0,0,0,903,901, + 1,0,0,0,903,904,1,0,0,0,904,182,1,0,0,0,905,907,5,92,0,0,906,908, + 7,1,0,0,907,906,1,0,0,0,908,909,1,0,0,0,909,907,1,0,0,0,909,910, + 1,0,0,0,910,184,1,0,0,0,22,0,192,208,223,240,276,380,503,520,752, + 797,805,807,817,820,827,831,833,851,880,903,909,1,6,0,0 + ] + +class LaTeXLexer(Lexer): + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + T__0 = 1 + T__1 = 2 + WS = 3 + THINSPACE = 4 + MEDSPACE = 5 + THICKSPACE = 6 + QUAD = 7 + QQUAD = 8 + NEGTHINSPACE = 9 + NEGMEDSPACE = 10 + NEGTHICKSPACE = 11 + CMD_LEFT = 12 + CMD_RIGHT = 13 + IGNORE = 14 + ADD = 15 + SUB = 16 + MUL = 17 + DIV = 18 + L_PAREN = 19 + R_PAREN = 20 + L_BRACE = 21 + R_BRACE = 22 + L_BRACE_LITERAL = 23 + R_BRACE_LITERAL = 24 + L_BRACKET = 25 + R_BRACKET = 26 + BAR = 27 + R_BAR = 28 + L_BAR = 29 + L_ANGLE = 30 + R_ANGLE = 31 + FUNC_LIM = 32 + LIM_APPROACH_SYM = 33 + FUNC_INT = 34 + FUNC_SUM = 35 + FUNC_PROD = 36 + FUNC_EXP = 37 + FUNC_LOG = 38 + FUNC_LG = 39 + FUNC_LN = 40 + FUNC_SIN = 41 + FUNC_COS = 42 + FUNC_TAN = 43 + FUNC_CSC = 44 + FUNC_SEC = 45 + FUNC_COT = 46 + FUNC_ARCSIN = 47 + FUNC_ARCCOS = 48 + FUNC_ARCTAN = 49 + FUNC_ARCCSC = 50 + FUNC_ARCSEC = 51 + FUNC_ARCCOT = 52 + FUNC_SINH = 53 + FUNC_COSH = 54 + FUNC_TANH = 55 + FUNC_ARSINH = 56 + FUNC_ARCOSH = 57 + FUNC_ARTANH = 58 + L_FLOOR = 59 + R_FLOOR = 60 + L_CEIL = 61 + R_CEIL = 62 + FUNC_SQRT = 63 + FUNC_OVERLINE = 64 + CMD_TIMES = 65 + CMD_CDOT = 66 + CMD_DIV = 67 + CMD_FRAC = 68 + CMD_BINOM = 69 + CMD_DBINOM = 70 + CMD_TBINOM = 71 + CMD_MATHIT = 72 + UNDERSCORE = 73 + CARET = 74 + COLON = 75 + DIFFERENTIAL = 76 + LETTER = 77 + DIGIT = 78 + EQUAL = 79 + NEQ = 80 + LT = 81 + LTE = 82 + LTE_Q = 83 + LTE_S = 84 + GT = 85 + GTE = 86 + GTE_Q = 87 + GTE_S = 88 + BANG = 89 + SINGLE_QUOTES = 90 + SYMBOL = 91 + + channelNames = [ u"DEFAULT_TOKEN_CHANNEL", u"HIDDEN" ] + + modeNames = [ "DEFAULT_MODE" ] + + literalNames = [ "", + "','", "'.'", "'\\quad'", "'\\qquad'", "'\\negmedspace'", "'\\negthickspace'", + "'\\left'", "'\\right'", "'+'", "'-'", "'*'", "'/'", "'('", + "')'", "'{'", "'}'", "'\\{'", "'\\}'", "'['", "']'", "'|'", + "'\\right|'", "'\\left|'", "'\\langle'", "'\\rangle'", "'\\lim'", + "'\\sum'", "'\\prod'", "'\\exp'", "'\\log'", "'\\lg'", "'\\ln'", + "'\\sin'", "'\\cos'", "'\\tan'", "'\\csc'", "'\\sec'", "'\\cot'", + "'\\arcsin'", "'\\arccos'", "'\\arctan'", "'\\arccsc'", "'\\arcsec'", + "'\\arccot'", "'\\sinh'", "'\\cosh'", "'\\tanh'", "'\\arsinh'", + "'\\arcosh'", "'\\artanh'", "'\\lfloor'", "'\\rfloor'", "'\\lceil'", + "'\\rceil'", "'\\sqrt'", "'\\overline'", "'\\times'", "'\\cdot'", + "'\\div'", "'\\binom'", "'\\dbinom'", "'\\tbinom'", "'\\mathit'", + "'_'", "'^'", "':'", "'\\neq'", "'<'", "'\\leqq'", "'\\leqslant'", + "'>'", "'\\geqq'", "'\\geqslant'", "'!'" ] + + symbolicNames = [ "", + "WS", "THINSPACE", "MEDSPACE", "THICKSPACE", "QUAD", "QQUAD", + "NEGTHINSPACE", "NEGMEDSPACE", "NEGTHICKSPACE", "CMD_LEFT", + "CMD_RIGHT", "IGNORE", "ADD", "SUB", "MUL", "DIV", "L_PAREN", + "R_PAREN", "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", "R_BRACE_LITERAL", + "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", "L_BAR", "L_ANGLE", + "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", "FUNC_INT", "FUNC_SUM", + "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", "FUNC_LG", "FUNC_LN", "FUNC_SIN", + "FUNC_COS", "FUNC_TAN", "FUNC_CSC", "FUNC_SEC", "FUNC_COT", + "FUNC_ARCSIN", "FUNC_ARCCOS", "FUNC_ARCTAN", "FUNC_ARCCSC", + "FUNC_ARCSEC", "FUNC_ARCCOT", "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", + "FUNC_ARSINH", "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", "R_FLOOR", + "L_CEIL", "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", "CMD_TIMES", + "CMD_CDOT", "CMD_DIV", "CMD_FRAC", "CMD_BINOM", "CMD_DBINOM", + "CMD_TBINOM", "CMD_MATHIT", "UNDERSCORE", "CARET", "COLON", + "DIFFERENTIAL", "LETTER", "DIGIT", "EQUAL", "NEQ", "LT", "LTE", + "LTE_Q", "LTE_S", "GT", "GTE", "GTE_Q", "GTE_S", "BANG", "SINGLE_QUOTES", + "SYMBOL" ] + + ruleNames = [ "T__0", "T__1", "WS", "THINSPACE", "MEDSPACE", "THICKSPACE", + "QUAD", "QQUAD", "NEGTHINSPACE", "NEGMEDSPACE", "NEGTHICKSPACE", + "CMD_LEFT", "CMD_RIGHT", "IGNORE", "ADD", "SUB", "MUL", + "DIV", "L_PAREN", "R_PAREN", "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", + "R_BRACE_LITERAL", "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", + "L_BAR", "L_ANGLE", "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", + "FUNC_INT", "FUNC_SUM", "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", + "FUNC_LG", "FUNC_LN", "FUNC_SIN", "FUNC_COS", "FUNC_TAN", + "FUNC_CSC", "FUNC_SEC", "FUNC_COT", "FUNC_ARCSIN", "FUNC_ARCCOS", + "FUNC_ARCTAN", "FUNC_ARCCSC", "FUNC_ARCSEC", "FUNC_ARCCOT", + "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", "FUNC_ARSINH", + "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", "R_FLOOR", "L_CEIL", + "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", "CMD_TIMES", "CMD_CDOT", + "CMD_DIV", "CMD_FRAC", "CMD_BINOM", "CMD_DBINOM", "CMD_TBINOM", + "CMD_MATHIT", "UNDERSCORE", "CARET", "COLON", "WS_CHAR", + "DIFFERENTIAL", "LETTER", "DIGIT", "EQUAL", "NEQ", "LT", + "LTE", "LTE_Q", "LTE_S", "GT", "GTE", "GTE_Q", "GTE_S", + "BANG", "SINGLE_QUOTES", "SYMBOL" ] + + grammarFileName = "LaTeX.g4" + + def __init__(self, input=None, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = LexerATNSimulator(self, self.atn, self.decisionsToDFA, PredictionContextCache()) + self._actions = None + self._predicates = None + + diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py new file mode 100644 index 0000000000000000000000000000000000000000..f6f58119055ded8f77380bbef52c77ddd6a01cfe --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py @@ -0,0 +1,3652 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + +def serializedATN(): + return [ + 4,1,91,522,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5,2,6,7, + 6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2,13,7,13, + 2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7,19,2,20, + 7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2,26,7,26, + 2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7,32,2,33, + 7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2,39,7,39, + 2,40,7,40,1,0,1,0,1,1,1,1,1,1,1,1,1,1,1,1,5,1,91,8,1,10,1,12,1,94, + 9,1,1,2,1,2,1,2,1,2,1,3,1,3,1,4,1,4,1,4,1,4,1,4,1,4,5,4,108,8,4, + 10,4,12,4,111,9,4,1,5,1,5,1,5,1,5,1,5,1,5,5,5,119,8,5,10,5,12,5, + 122,9,5,1,6,1,6,1,6,1,6,1,6,1,6,5,6,130,8,6,10,6,12,6,133,9,6,1, + 7,1,7,1,7,4,7,138,8,7,11,7,12,7,139,3,7,142,8,7,1,8,1,8,1,8,1,8, + 5,8,148,8,8,10,8,12,8,151,9,8,3,8,153,8,8,1,9,1,9,5,9,157,8,9,10, + 9,12,9,160,9,9,1,10,1,10,5,10,164,8,10,10,10,12,10,167,9,10,1,11, + 1,11,3,11,171,8,11,1,12,1,12,1,12,1,12,1,12,1,12,3,12,179,8,12,1, + 13,1,13,1,13,1,13,3,13,185,8,13,1,13,1,13,1,14,1,14,1,14,1,14,3, + 14,193,8,14,1,14,1,14,1,15,1,15,1,15,1,15,1,15,1,15,1,15,1,15,1, + 15,1,15,3,15,207,8,15,1,15,3,15,210,8,15,5,15,212,8,15,10,15,12, + 15,215,9,15,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,3, + 16,227,8,16,1,16,3,16,230,8,16,5,16,232,8,16,10,16,12,16,235,9,16, + 1,17,1,17,1,17,1,17,1,17,1,17,3,17,243,8,17,1,18,1,18,1,18,1,18, + 1,18,3,18,250,8,18,1,19,1,19,1,19,1,19,1,19,1,19,1,19,1,19,1,19, + 1,19,1,19,1,19,1,19,1,19,1,19,1,19,3,19,268,8,19,1,20,1,20,1,20, + 1,20,1,21,4,21,275,8,21,11,21,12,21,276,1,21,1,21,1,21,1,21,5,21, + 283,8,21,10,21,12,21,286,9,21,1,21,1,21,4,21,290,8,21,11,21,12,21, + 291,3,21,294,8,21,1,22,1,22,3,22,298,8,22,1,22,3,22,301,8,22,1,22, + 3,22,304,8,22,1,22,3,22,307,8,22,3,22,309,8,22,1,22,1,22,1,22,1, + 22,1,22,1,22,1,22,3,22,318,8,22,1,23,1,23,1,23,1,23,1,24,1,24,1, + 24,1,24,1,25,1,25,1,25,1,25,1,25,1,26,5,26,334,8,26,10,26,12,26, + 337,9,26,1,27,1,27,1,27,1,27,1,27,1,27,3,27,345,8,27,1,27,1,27,1, + 27,1,27,1,27,3,27,352,8,27,1,28,1,28,1,28,1,28,1,28,1,28,1,28,1, + 28,1,29,1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,31,1,31,1,32,1,32,3, + 32,374,8,32,1,32,3,32,377,8,32,1,32,3,32,380,8,32,1,32,3,32,383, + 8,32,3,32,385,8,32,1,32,1,32,1,32,1,32,1,32,3,32,392,8,32,1,32,1, + 32,3,32,396,8,32,1,32,3,32,399,8,32,1,32,3,32,402,8,32,1,32,3,32, + 405,8,32,3,32,407,8,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1, + 32,1,32,1,32,3,32,420,8,32,1,32,3,32,423,8,32,1,32,1,32,1,32,3,32, + 428,8,32,1,32,1,32,1,32,1,32,1,32,3,32,435,8,32,1,32,1,32,1,32,1, + 32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,3, + 32,453,8,32,1,32,1,32,1,32,1,32,1,32,1,32,3,32,461,8,32,1,33,1,33, + 1,33,1,33,1,33,3,33,468,8,33,1,34,1,34,1,34,1,34,1,34,1,34,1,34, + 1,34,1,34,1,34,1,34,3,34,481,8,34,3,34,483,8,34,1,34,1,34,1,35,1, + 35,1,35,1,35,1,35,3,35,492,8,35,1,36,1,36,1,37,1,37,1,37,1,37,1, + 37,1,37,3,37,502,8,37,1,38,1,38,1,38,1,38,1,38,1,38,3,38,510,8,38, + 1,39,1,39,1,39,1,39,1,39,1,40,1,40,1,40,1,40,1,40,1,40,0,6,2,8,10, + 12,30,32,41,0,2,4,6,8,10,12,14,16,18,20,22,24,26,28,30,32,34,36, + 38,40,42,44,46,48,50,52,54,56,58,60,62,64,66,68,70,72,74,76,78,80, + 0,9,2,0,79,82,85,86,1,0,15,16,3,0,17,18,65,67,75,75,2,0,77,77,91, + 91,1,0,27,28,2,0,27,27,29,29,1,0,69,71,1,0,37,58,1,0,35,36,563,0, + 82,1,0,0,0,2,84,1,0,0,0,4,95,1,0,0,0,6,99,1,0,0,0,8,101,1,0,0,0, + 10,112,1,0,0,0,12,123,1,0,0,0,14,141,1,0,0,0,16,152,1,0,0,0,18,154, + 1,0,0,0,20,161,1,0,0,0,22,170,1,0,0,0,24,172,1,0,0,0,26,180,1,0, + 0,0,28,188,1,0,0,0,30,196,1,0,0,0,32,216,1,0,0,0,34,242,1,0,0,0, + 36,249,1,0,0,0,38,267,1,0,0,0,40,269,1,0,0,0,42,274,1,0,0,0,44,317, + 1,0,0,0,46,319,1,0,0,0,48,323,1,0,0,0,50,327,1,0,0,0,52,335,1,0, + 0,0,54,338,1,0,0,0,56,353,1,0,0,0,58,361,1,0,0,0,60,365,1,0,0,0, + 62,369,1,0,0,0,64,460,1,0,0,0,66,467,1,0,0,0,68,469,1,0,0,0,70,491, + 1,0,0,0,72,493,1,0,0,0,74,495,1,0,0,0,76,503,1,0,0,0,78,511,1,0, + 0,0,80,516,1,0,0,0,82,83,3,2,1,0,83,1,1,0,0,0,84,85,6,1,-1,0,85, + 86,3,6,3,0,86,92,1,0,0,0,87,88,10,2,0,0,88,89,7,0,0,0,89,91,3,2, + 1,3,90,87,1,0,0,0,91,94,1,0,0,0,92,90,1,0,0,0,92,93,1,0,0,0,93,3, + 1,0,0,0,94,92,1,0,0,0,95,96,3,6,3,0,96,97,5,79,0,0,97,98,3,6,3,0, + 98,5,1,0,0,0,99,100,3,8,4,0,100,7,1,0,0,0,101,102,6,4,-1,0,102,103, + 3,10,5,0,103,109,1,0,0,0,104,105,10,2,0,0,105,106,7,1,0,0,106,108, + 3,8,4,3,107,104,1,0,0,0,108,111,1,0,0,0,109,107,1,0,0,0,109,110, + 1,0,0,0,110,9,1,0,0,0,111,109,1,0,0,0,112,113,6,5,-1,0,113,114,3, + 14,7,0,114,120,1,0,0,0,115,116,10,2,0,0,116,117,7,2,0,0,117,119, + 3,10,5,3,118,115,1,0,0,0,119,122,1,0,0,0,120,118,1,0,0,0,120,121, + 1,0,0,0,121,11,1,0,0,0,122,120,1,0,0,0,123,124,6,6,-1,0,124,125, + 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5,27,0,0,173,179,3,28,14,0,174,179,3,26,13,0,175,176,3,28,14,0,176, + 177,3,26,13,0,177,179,1,0,0,0,178,173,1,0,0,0,178,174,1,0,0,0,178, + 175,1,0,0,0,179,25,1,0,0,0,180,181,5,73,0,0,181,184,5,21,0,0,182, + 185,3,6,3,0,183,185,3,4,2,0,184,182,1,0,0,0,184,183,1,0,0,0,185, + 186,1,0,0,0,186,187,5,22,0,0,187,27,1,0,0,0,188,189,5,74,0,0,189, + 192,5,21,0,0,190,193,3,6,3,0,191,193,3,4,2,0,192,190,1,0,0,0,192, + 191,1,0,0,0,193,194,1,0,0,0,194,195,5,22,0,0,195,29,1,0,0,0,196, + 197,6,15,-1,0,197,198,3,34,17,0,198,213,1,0,0,0,199,200,10,2,0,0, + 200,206,5,74,0,0,201,207,3,44,22,0,202,203,5,21,0,0,203,204,3,6, + 3,0,204,205,5,22,0,0,205,207,1,0,0,0,206,201,1,0,0,0,206,202,1,0, + 0,0,207,209,1,0,0,0,208,210,3,74,37,0,209,208,1,0,0,0,209,210,1, + 0,0,0,210,212,1,0,0,0,211,199,1,0,0,0,212,215,1,0,0,0,213,211,1, + 0,0,0,213,214,1,0,0,0,214,31,1,0,0,0,215,213,1,0,0,0,216,217,6,16, + -1,0,217,218,3,36,18,0,218,233,1,0,0,0,219,220,10,2,0,0,220,226, + 5,74,0,0,221,227,3,44,22,0,222,223,5,21,0,0,223,224,3,6,3,0,224, + 225,5,22,0,0,225,227,1,0,0,0,226,221,1,0,0,0,226,222,1,0,0,0,227, + 229,1,0,0,0,228,230,3,74,37,0,229,228,1,0,0,0,229,230,1,0,0,0,230, + 232,1,0,0,0,231,219,1,0,0,0,232,235,1,0,0,0,233,231,1,0,0,0,233, + 234,1,0,0,0,234,33,1,0,0,0,235,233,1,0,0,0,236,243,3,38,19,0,237, + 243,3,40,20,0,238,243,3,64,32,0,239,243,3,44,22,0,240,243,3,58,29, + 0,241,243,3,60,30,0,242,236,1,0,0,0,242,237,1,0,0,0,242,238,1,0, + 0,0,242,239,1,0,0,0,242,240,1,0,0,0,242,241,1,0,0,0,243,35,1,0,0, + 0,244,250,3,38,19,0,245,250,3,40,20,0,246,250,3,44,22,0,247,250, + 3,58,29,0,248,250,3,60,30,0,249,244,1,0,0,0,249,245,1,0,0,0,249, + 246,1,0,0,0,249,247,1,0,0,0,249,248,1,0,0,0,250,37,1,0,0,0,251,252, + 5,19,0,0,252,253,3,6,3,0,253,254,5,20,0,0,254,268,1,0,0,0,255,256, + 5,25,0,0,256,257,3,6,3,0,257,258,5,26,0,0,258,268,1,0,0,0,259,260, + 5,21,0,0,260,261,3,6,3,0,261,262,5,22,0,0,262,268,1,0,0,0,263,264, + 5,23,0,0,264,265,3,6,3,0,265,266,5,24,0,0,266,268,1,0,0,0,267,251, + 1,0,0,0,267,255,1,0,0,0,267,259,1,0,0,0,267,263,1,0,0,0,268,39,1, + 0,0,0,269,270,5,27,0,0,270,271,3,6,3,0,271,272,5,27,0,0,272,41,1, + 0,0,0,273,275,5,78,0,0,274,273,1,0,0,0,275,276,1,0,0,0,276,274,1, + 0,0,0,276,277,1,0,0,0,277,284,1,0,0,0,278,279,5,1,0,0,279,280,5, + 78,0,0,280,281,5,78,0,0,281,283,5,78,0,0,282,278,1,0,0,0,283,286, + 1,0,0,0,284,282,1,0,0,0,284,285,1,0,0,0,285,293,1,0,0,0,286,284, + 1,0,0,0,287,289,5,2,0,0,288,290,5,78,0,0,289,288,1,0,0,0,290,291, + 1,0,0,0,291,289,1,0,0,0,291,292,1,0,0,0,292,294,1,0,0,0,293,287, + 1,0,0,0,293,294,1,0,0,0,294,43,1,0,0,0,295,308,7,3,0,0,296,298,3, + 74,37,0,297,296,1,0,0,0,297,298,1,0,0,0,298,300,1,0,0,0,299,301, + 5,90,0,0,300,299,1,0,0,0,300,301,1,0,0,0,301,309,1,0,0,0,302,304, + 5,90,0,0,303,302,1,0,0,0,303,304,1,0,0,0,304,306,1,0,0,0,305,307, + 3,74,37,0,306,305,1,0,0,0,306,307,1,0,0,0,307,309,1,0,0,0,308,297, + 1,0,0,0,308,303,1,0,0,0,309,318,1,0,0,0,310,318,3,42,21,0,311,318, + 5,76,0,0,312,318,3,50,25,0,313,318,3,54,27,0,314,318,3,56,28,0,315, + 318,3,46,23,0,316,318,3,48,24,0,317,295,1,0,0,0,317,310,1,0,0,0, + 317,311,1,0,0,0,317,312,1,0,0,0,317,313,1,0,0,0,317,314,1,0,0,0, + 317,315,1,0,0,0,317,316,1,0,0,0,318,45,1,0,0,0,319,320,5,30,0,0, + 320,321,3,6,3,0,321,322,7,4,0,0,322,47,1,0,0,0,323,324,7,5,0,0,324, + 325,3,6,3,0,325,326,5,31,0,0,326,49,1,0,0,0,327,328,5,72,0,0,328, + 329,5,21,0,0,329,330,3,52,26,0,330,331,5,22,0,0,331,51,1,0,0,0,332, + 334,5,77,0,0,333,332,1,0,0,0,334,337,1,0,0,0,335,333,1,0,0,0,335, + 336,1,0,0,0,336,53,1,0,0,0,337,335,1,0,0,0,338,344,5,68,0,0,339, + 345,5,78,0,0,340,341,5,21,0,0,341,342,3,6,3,0,342,343,5,22,0,0,343, + 345,1,0,0,0,344,339,1,0,0,0,344,340,1,0,0,0,345,351,1,0,0,0,346, + 352,5,78,0,0,347,348,5,21,0,0,348,349,3,6,3,0,349,350,5,22,0,0,350, + 352,1,0,0,0,351,346,1,0,0,0,351,347,1,0,0,0,352,55,1,0,0,0,353,354, + 7,6,0,0,354,355,5,21,0,0,355,356,3,6,3,0,356,357,5,22,0,0,357,358, + 5,21,0,0,358,359,3,6,3,0,359,360,5,22,0,0,360,57,1,0,0,0,361,362, + 5,59,0,0,362,363,3,6,3,0,363,364,5,60,0,0,364,59,1,0,0,0,365,366, + 5,61,0,0,366,367,3,6,3,0,367,368,5,62,0,0,368,61,1,0,0,0,369,370, + 7,7,0,0,370,63,1,0,0,0,371,384,3,62,31,0,372,374,3,74,37,0,373,372, + 1,0,0,0,373,374,1,0,0,0,374,376,1,0,0,0,375,377,3,76,38,0,376,375, + 1,0,0,0,376,377,1,0,0,0,377,385,1,0,0,0,378,380,3,76,38,0,379,378, + 1,0,0,0,379,380,1,0,0,0,380,382,1,0,0,0,381,383,3,74,37,0,382,381, + 1,0,0,0,382,383,1,0,0,0,383,385,1,0,0,0,384,373,1,0,0,0,384,379, + 1,0,0,0,385,391,1,0,0,0,386,387,5,19,0,0,387,388,3,70,35,0,388,389, + 5,20,0,0,389,392,1,0,0,0,390,392,3,72,36,0,391,386,1,0,0,0,391,390, + 1,0,0,0,392,461,1,0,0,0,393,406,7,3,0,0,394,396,3,74,37,0,395,394, + 1,0,0,0,395,396,1,0,0,0,396,398,1,0,0,0,397,399,5,90,0,0,398,397, + 1,0,0,0,398,399,1,0,0,0,399,407,1,0,0,0,400,402,5,90,0,0,401,400, + 1,0,0,0,401,402,1,0,0,0,402,404,1,0,0,0,403,405,3,74,37,0,404,403, + 1,0,0,0,404,405,1,0,0,0,405,407,1,0,0,0,406,395,1,0,0,0,406,401, + 1,0,0,0,407,408,1,0,0,0,408,409,5,19,0,0,409,410,3,66,33,0,410,411, + 5,20,0,0,411,461,1,0,0,0,412,419,5,34,0,0,413,414,3,74,37,0,414, + 415,3,76,38,0,415,420,1,0,0,0,416,417,3,76,38,0,417,418,3,74,37, + 0,418,420,1,0,0,0,419,413,1,0,0,0,419,416,1,0,0,0,419,420,1,0,0, + 0,420,427,1,0,0,0,421,423,3,8,4,0,422,421,1,0,0,0,422,423,1,0,0, + 0,423,424,1,0,0,0,424,428,5,76,0,0,425,428,3,54,27,0,426,428,3,8, + 4,0,427,422,1,0,0,0,427,425,1,0,0,0,427,426,1,0,0,0,428,461,1,0, + 0,0,429,434,5,63,0,0,430,431,5,25,0,0,431,432,3,6,3,0,432,433,5, + 26,0,0,433,435,1,0,0,0,434,430,1,0,0,0,434,435,1,0,0,0,435,436,1, + 0,0,0,436,437,5,21,0,0,437,438,3,6,3,0,438,439,5,22,0,0,439,461, + 1,0,0,0,440,441,5,64,0,0,441,442,5,21,0,0,442,443,3,6,3,0,443,444, + 5,22,0,0,444,461,1,0,0,0,445,452,7,8,0,0,446,447,3,78,39,0,447,448, + 3,76,38,0,448,453,1,0,0,0,449,450,3,76,38,0,450,451,3,78,39,0,451, + 453,1,0,0,0,452,446,1,0,0,0,452,449,1,0,0,0,453,454,1,0,0,0,454, + 455,3,10,5,0,455,461,1,0,0,0,456,457,5,32,0,0,457,458,3,68,34,0, + 458,459,3,10,5,0,459,461,1,0,0,0,460,371,1,0,0,0,460,393,1,0,0,0, + 460,412,1,0,0,0,460,429,1,0,0,0,460,440,1,0,0,0,460,445,1,0,0,0, + 460,456,1,0,0,0,461,65,1,0,0,0,462,463,3,6,3,0,463,464,5,1,0,0,464, + 465,3,66,33,0,465,468,1,0,0,0,466,468,3,6,3,0,467,462,1,0,0,0,467, + 466,1,0,0,0,468,67,1,0,0,0,469,470,5,73,0,0,470,471,5,21,0,0,471, + 472,7,3,0,0,472,473,5,33,0,0,473,482,3,6,3,0,474,480,5,74,0,0,475, + 476,5,21,0,0,476,477,7,1,0,0,477,481,5,22,0,0,478,481,5,15,0,0,479, + 481,5,16,0,0,480,475,1,0,0,0,480,478,1,0,0,0,480,479,1,0,0,0,481, + 483,1,0,0,0,482,474,1,0,0,0,482,483,1,0,0,0,483,484,1,0,0,0,484, + 485,5,22,0,0,485,69,1,0,0,0,486,492,3,6,3,0,487,488,3,6,3,0,488, + 489,5,1,0,0,489,490,3,70,35,0,490,492,1,0,0,0,491,486,1,0,0,0,491, + 487,1,0,0,0,492,71,1,0,0,0,493,494,3,12,6,0,494,73,1,0,0,0,495,501, + 5,73,0,0,496,502,3,44,22,0,497,498,5,21,0,0,498,499,3,6,3,0,499, + 500,5,22,0,0,500,502,1,0,0,0,501,496,1,0,0,0,501,497,1,0,0,0,502, + 75,1,0,0,0,503,509,5,74,0,0,504,510,3,44,22,0,505,506,5,21,0,0,506, + 507,3,6,3,0,507,508,5,22,0,0,508,510,1,0,0,0,509,504,1,0,0,0,509, + 505,1,0,0,0,510,77,1,0,0,0,511,512,5,73,0,0,512,513,5,21,0,0,513, + 514,3,4,2,0,514,515,5,22,0,0,515,79,1,0,0,0,516,517,5,73,0,0,517, + 518,5,21,0,0,518,519,3,4,2,0,519,520,5,22,0,0,520,81,1,0,0,0,59, + 92,109,120,131,139,141,149,152,158,165,170,178,184,192,206,209,213, + 226,229,233,242,249,267,276,284,291,293,297,300,303,306,308,317, + 335,344,351,373,376,379,382,384,391,395,398,401,404,406,419,422, + 427,434,452,460,467,480,482,491,501,509 + ] + +class LaTeXParser ( Parser ): + + grammarFileName = "LaTeX.g4" + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + sharedContextCache = PredictionContextCache() + + literalNames = [ "", "','", "'.'", "", "", + "", "", "'\\quad'", "'\\qquad'", + "", "'\\negmedspace'", "'\\negthickspace'", + "'\\left'", "'\\right'", "", "'+'", "'-'", + "'*'", "'/'", "'('", "')'", "'{'", "'}'", "'\\{'", + "'\\}'", "'['", "']'", "'|'", "'\\right|'", "'\\left|'", + "'\\langle'", "'\\rangle'", "'\\lim'", "", + "", "'\\sum'", "'\\prod'", "'\\exp'", "'\\log'", + "'\\lg'", "'\\ln'", "'\\sin'", "'\\cos'", "'\\tan'", + "'\\csc'", "'\\sec'", "'\\cot'", "'\\arcsin'", "'\\arccos'", + "'\\arctan'", "'\\arccsc'", "'\\arcsec'", "'\\arccot'", + "'\\sinh'", "'\\cosh'", "'\\tanh'", "'\\arsinh'", "'\\arcosh'", + "'\\artanh'", "'\\lfloor'", "'\\rfloor'", "'\\lceil'", + "'\\rceil'", "'\\sqrt'", "'\\overline'", "'\\times'", + "'\\cdot'", "'\\div'", "", "'\\binom'", "'\\dbinom'", + "'\\tbinom'", "'\\mathit'", "'_'", "'^'", "':'", "", + "", "", "", "'\\neq'", "'<'", + "", "'\\leqq'", "'\\leqslant'", "'>'", "", + "'\\geqq'", "'\\geqslant'", "'!'" ] + + symbolicNames = [ "", "", "", "WS", "THINSPACE", + "MEDSPACE", "THICKSPACE", "QUAD", "QQUAD", "NEGTHINSPACE", + "NEGMEDSPACE", "NEGTHICKSPACE", "CMD_LEFT", "CMD_RIGHT", + "IGNORE", "ADD", "SUB", "MUL", "DIV", "L_PAREN", "R_PAREN", + "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", "R_BRACE_LITERAL", + "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", "L_BAR", + "L_ANGLE", "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", + "FUNC_INT", "FUNC_SUM", "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", + "FUNC_LG", "FUNC_LN", "FUNC_SIN", "FUNC_COS", "FUNC_TAN", + "FUNC_CSC", "FUNC_SEC", "FUNC_COT", "FUNC_ARCSIN", + "FUNC_ARCCOS", "FUNC_ARCTAN", "FUNC_ARCCSC", "FUNC_ARCSEC", + "FUNC_ARCCOT", "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", + "FUNC_ARSINH", "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", + "R_FLOOR", "L_CEIL", "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", + "CMD_TIMES", "CMD_CDOT", "CMD_DIV", "CMD_FRAC", "CMD_BINOM", + "CMD_DBINOM", "CMD_TBINOM", "CMD_MATHIT", "UNDERSCORE", + "CARET", "COLON", "DIFFERENTIAL", "LETTER", "DIGIT", + "EQUAL", "NEQ", "LT", "LTE", "LTE_Q", "LTE_S", "GT", + "GTE", "GTE_Q", "GTE_S", "BANG", "SINGLE_QUOTES", + "SYMBOL" ] + + RULE_math = 0 + RULE_relation = 1 + RULE_equality = 2 + RULE_expr = 3 + RULE_additive = 4 + RULE_mp = 5 + RULE_mp_nofunc = 6 + RULE_unary = 7 + RULE_unary_nofunc = 8 + RULE_postfix = 9 + RULE_postfix_nofunc = 10 + RULE_postfix_op = 11 + RULE_eval_at = 12 + RULE_eval_at_sub = 13 + RULE_eval_at_sup = 14 + RULE_exp = 15 + RULE_exp_nofunc = 16 + RULE_comp = 17 + RULE_comp_nofunc = 18 + RULE_group = 19 + RULE_abs_group = 20 + RULE_number = 21 + RULE_atom = 22 + RULE_bra = 23 + RULE_ket = 24 + RULE_mathit = 25 + RULE_mathit_text = 26 + RULE_frac = 27 + RULE_binom = 28 + RULE_floor = 29 + RULE_ceil = 30 + RULE_func_normal = 31 + RULE_func = 32 + RULE_args = 33 + RULE_limit_sub = 34 + RULE_func_arg = 35 + RULE_func_arg_noparens = 36 + RULE_subexpr = 37 + RULE_supexpr = 38 + RULE_subeq = 39 + RULE_supeq = 40 + + ruleNames = [ "math", "relation", "equality", "expr", "additive", "mp", + "mp_nofunc", "unary", "unary_nofunc", "postfix", "postfix_nofunc", + "postfix_op", "eval_at", "eval_at_sub", "eval_at_sup", + "exp", "exp_nofunc", "comp", "comp_nofunc", "group", + "abs_group", "number", "atom", "bra", "ket", "mathit", + "mathit_text", "frac", "binom", "floor", "ceil", "func_normal", + "func", "args", "limit_sub", "func_arg", "func_arg_noparens", + "subexpr", "supexpr", "subeq", "supeq" ] + + EOF = Token.EOF + T__0=1 + T__1=2 + WS=3 + THINSPACE=4 + MEDSPACE=5 + THICKSPACE=6 + QUAD=7 + QQUAD=8 + NEGTHINSPACE=9 + NEGMEDSPACE=10 + NEGTHICKSPACE=11 + CMD_LEFT=12 + CMD_RIGHT=13 + IGNORE=14 + ADD=15 + SUB=16 + MUL=17 + DIV=18 + L_PAREN=19 + R_PAREN=20 + L_BRACE=21 + R_BRACE=22 + L_BRACE_LITERAL=23 + R_BRACE_LITERAL=24 + L_BRACKET=25 + R_BRACKET=26 + BAR=27 + R_BAR=28 + L_BAR=29 + L_ANGLE=30 + R_ANGLE=31 + FUNC_LIM=32 + LIM_APPROACH_SYM=33 + FUNC_INT=34 + FUNC_SUM=35 + FUNC_PROD=36 + FUNC_EXP=37 + FUNC_LOG=38 + FUNC_LG=39 + FUNC_LN=40 + FUNC_SIN=41 + FUNC_COS=42 + FUNC_TAN=43 + FUNC_CSC=44 + FUNC_SEC=45 + FUNC_COT=46 + FUNC_ARCSIN=47 + FUNC_ARCCOS=48 + FUNC_ARCTAN=49 + FUNC_ARCCSC=50 + FUNC_ARCSEC=51 + FUNC_ARCCOT=52 + FUNC_SINH=53 + FUNC_COSH=54 + FUNC_TANH=55 + FUNC_ARSINH=56 + FUNC_ARCOSH=57 + FUNC_ARTANH=58 + L_FLOOR=59 + R_FLOOR=60 + L_CEIL=61 + R_CEIL=62 + FUNC_SQRT=63 + FUNC_OVERLINE=64 + CMD_TIMES=65 + CMD_CDOT=66 + CMD_DIV=67 + CMD_FRAC=68 + CMD_BINOM=69 + CMD_DBINOM=70 + CMD_TBINOM=71 + CMD_MATHIT=72 + UNDERSCORE=73 + CARET=74 + COLON=75 + DIFFERENTIAL=76 + LETTER=77 + DIGIT=78 + EQUAL=79 + NEQ=80 + LT=81 + LTE=82 + LTE_Q=83 + LTE_S=84 + GT=85 + GTE=86 + GTE_Q=87 + GTE_S=88 + BANG=89 + SINGLE_QUOTES=90 + SYMBOL=91 + + def __init__(self, input:TokenStream, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = ParserATNSimulator(self, self.atn, self.decisionsToDFA, self.sharedContextCache) + self._predicates = None + + + + + class MathContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def relation(self): + return self.getTypedRuleContext(LaTeXParser.RelationContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_math + + + + + def math(self): + + localctx = LaTeXParser.MathContext(self, self._ctx, self.state) + self.enterRule(localctx, 0, self.RULE_math) + try: + self.enterOuterAlt(localctx, 1) + self.state = 82 + self.relation(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class RelationContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def relation(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.RelationContext) + else: + return self.getTypedRuleContext(LaTeXParser.RelationContext,i) + + + def EQUAL(self): + return self.getToken(LaTeXParser.EQUAL, 0) + + def LT(self): + return self.getToken(LaTeXParser.LT, 0) + + def LTE(self): + return self.getToken(LaTeXParser.LTE, 0) + + def GT(self): + return self.getToken(LaTeXParser.GT, 0) + + def GTE(self): + return self.getToken(LaTeXParser.GTE, 0) + + def NEQ(self): + return self.getToken(LaTeXParser.NEQ, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_relation + + + + def relation(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.RelationContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 2 + self.enterRecursionRule(localctx, 2, self.RULE_relation, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 85 + self.expr() + self._ctx.stop = self._input.LT(-1) + self.state = 92 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,0,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.RelationContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_relation) + self.state = 87 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 88 + _la = self._input.LA(1) + if not((((_la - 79)) & ~0x3f) == 0 and ((1 << (_la - 79)) & 207) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 89 + self.relation(3) + self.state = 94 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,0,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class EqualityContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def EQUAL(self): + return self.getToken(LaTeXParser.EQUAL, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_equality + + + + + def equality(self): + + localctx = LaTeXParser.EqualityContext(self, self._ctx, self.state) + self.enterRule(localctx, 4, self.RULE_equality) + try: + self.enterOuterAlt(localctx, 1) + self.state = 95 + self.expr() + self.state = 96 + self.match(LaTeXParser.EQUAL) + self.state = 97 + self.expr() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def additive(self): + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_expr + + + + + def expr(self): + + localctx = LaTeXParser.ExprContext(self, self._ctx, self.state) + self.enterRule(localctx, 6, self.RULE_expr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 99 + self.additive(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AdditiveContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def mp(self): + return self.getTypedRuleContext(LaTeXParser.MpContext,0) + + + def additive(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.AdditiveContext) + else: + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,i) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_additive + + + + def additive(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.AdditiveContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 8 + self.enterRecursionRule(localctx, 8, self.RULE_additive, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 102 + self.mp(0) + self._ctx.stop = self._input.LT(-1) + self.state = 109 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,1,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.AdditiveContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_additive) + self.state = 104 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 105 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 106 + self.additive(3) + self.state = 111 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,1,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class MpContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary(self): + return self.getTypedRuleContext(LaTeXParser.UnaryContext,0) + + + def mp(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.MpContext) + else: + return self.getTypedRuleContext(LaTeXParser.MpContext,i) + + + def MUL(self): + return self.getToken(LaTeXParser.MUL, 0) + + def CMD_TIMES(self): + return self.getToken(LaTeXParser.CMD_TIMES, 0) + + def CMD_CDOT(self): + return self.getToken(LaTeXParser.CMD_CDOT, 0) + + def DIV(self): + return self.getToken(LaTeXParser.DIV, 0) + + def CMD_DIV(self): + return self.getToken(LaTeXParser.CMD_DIV, 0) + + def COLON(self): + return self.getToken(LaTeXParser.COLON, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mp + + + + def mp(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.MpContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 10 + self.enterRecursionRule(localctx, 10, self.RULE_mp, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 113 + self.unary() + self._ctx.stop = self._input.LT(-1) + self.state = 120 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,2,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.MpContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_mp) + self.state = 115 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 116 + _la = self._input.LA(1) + if not((((_la - 17)) & ~0x3f) == 0 and ((1 << (_la - 17)) & 290200700988686339) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 117 + self.mp(3) + self.state = 122 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,2,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class Mp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Unary_nofuncContext,0) + + + def mp_nofunc(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Mp_nofuncContext) + else: + return self.getTypedRuleContext(LaTeXParser.Mp_nofuncContext,i) + + + def MUL(self): + return self.getToken(LaTeXParser.MUL, 0) + + def CMD_TIMES(self): + return self.getToken(LaTeXParser.CMD_TIMES, 0) + + def CMD_CDOT(self): + return self.getToken(LaTeXParser.CMD_CDOT, 0) + + def DIV(self): + return self.getToken(LaTeXParser.DIV, 0) + + def CMD_DIV(self): + return self.getToken(LaTeXParser.CMD_DIV, 0) + + def COLON(self): + return self.getToken(LaTeXParser.COLON, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mp_nofunc + + + + def mp_nofunc(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.Mp_nofuncContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 12 + self.enterRecursionRule(localctx, 12, self.RULE_mp_nofunc, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 124 + self.unary_nofunc() + self._ctx.stop = self._input.LT(-1) + self.state = 131 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,3,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.Mp_nofuncContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_mp_nofunc) + self.state = 126 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 127 + _la = self._input.LA(1) + if not((((_la - 17)) & ~0x3f) == 0 and ((1 << (_la - 17)) & 290200700988686339) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 128 + self.mp_nofunc(3) + self.state = 133 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,3,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class UnaryContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary(self): + return self.getTypedRuleContext(LaTeXParser.UnaryContext,0) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def postfix(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.PostfixContext) + else: + return self.getTypedRuleContext(LaTeXParser.PostfixContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_unary + + + + + def unary(self): + + localctx = LaTeXParser.UnaryContext(self, self._ctx, self.state) + self.enterRule(localctx, 14, self.RULE_unary) + self._la = 0 # Token type + try: + self.state = 141 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [15, 16]: + self.enterOuterAlt(localctx, 1) + self.state = 134 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 135 + self.unary() + pass + elif token in [19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 137 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 136 + self.postfix() + + else: + raise NoViableAltException(self) + self.state = 139 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,4,self._ctx) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Unary_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Unary_nofuncContext,0) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def postfix(self): + return self.getTypedRuleContext(LaTeXParser.PostfixContext,0) + + + def postfix_nofunc(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_nofuncContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_nofuncContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_unary_nofunc + + + + + def unary_nofunc(self): + + localctx = LaTeXParser.Unary_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 16, self.RULE_unary_nofunc) + self._la = 0 # Token type + try: + self.state = 152 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [15, 16]: + self.enterOuterAlt(localctx, 1) + self.state = 143 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 144 + self.unary_nofunc() + pass + elif token in [19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 145 + self.postfix() + self.state = 149 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,6,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 146 + self.postfix_nofunc() + self.state = 151 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,6,self._ctx) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class PostfixContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def exp(self): + return self.getTypedRuleContext(LaTeXParser.ExpContext,0) + + + def postfix_op(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_opContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_opContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix + + + + + def postfix(self): + + localctx = LaTeXParser.PostfixContext(self, self._ctx, self.state) + self.enterRule(localctx, 18, self.RULE_postfix) + try: + self.enterOuterAlt(localctx, 1) + self.state = 154 + self.exp(0) + self.state = 158 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,8,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 155 + self.postfix_op() + self.state = 160 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,8,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Postfix_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def exp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Exp_nofuncContext,0) + + + def postfix_op(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_opContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_opContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix_nofunc + + + + + def postfix_nofunc(self): + + localctx = LaTeXParser.Postfix_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 20, self.RULE_postfix_nofunc) + try: + self.enterOuterAlt(localctx, 1) + self.state = 161 + self.exp_nofunc(0) + self.state = 165 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,9,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 162 + self.postfix_op() + self.state = 167 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,9,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Postfix_opContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BANG(self): + return self.getToken(LaTeXParser.BANG, 0) + + def eval_at(self): + return self.getTypedRuleContext(LaTeXParser.Eval_atContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix_op + + + + + def postfix_op(self): + + localctx = LaTeXParser.Postfix_opContext(self, self._ctx, self.state) + self.enterRule(localctx, 22, self.RULE_postfix_op) + try: + self.state = 170 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [89]: + self.enterOuterAlt(localctx, 1) + self.state = 168 + self.match(LaTeXParser.BANG) + pass + elif token in [27]: + self.enterOuterAlt(localctx, 2) + self.state = 169 + self.eval_at() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_atContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def eval_at_sup(self): + return self.getTypedRuleContext(LaTeXParser.Eval_at_supContext,0) + + + def eval_at_sub(self): + return self.getTypedRuleContext(LaTeXParser.Eval_at_subContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at + + + + + def eval_at(self): + + localctx = LaTeXParser.Eval_atContext(self, self._ctx, self.state) + self.enterRule(localctx, 24, self.RULE_eval_at) + try: + self.enterOuterAlt(localctx, 1) + self.state = 172 + self.match(LaTeXParser.BAR) + self.state = 178 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,11,self._ctx) + if la_ == 1: + self.state = 173 + self.eval_at_sup() + pass + + elif la_ == 2: + self.state = 174 + self.eval_at_sub() + pass + + elif la_ == 3: + self.state = 175 + self.eval_at_sup() + self.state = 176 + self.eval_at_sub() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_at_subContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at_sub + + + + + def eval_at_sub(self): + + localctx = LaTeXParser.Eval_at_subContext(self, self._ctx, self.state) + self.enterRule(localctx, 26, self.RULE_eval_at_sub) + try: + self.enterOuterAlt(localctx, 1) + self.state = 180 + self.match(LaTeXParser.UNDERSCORE) + self.state = 181 + self.match(LaTeXParser.L_BRACE) + self.state = 184 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,12,self._ctx) + if la_ == 1: + self.state = 182 + self.expr() + pass + + elif la_ == 2: + self.state = 183 + self.equality() + pass + + + self.state = 186 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_at_supContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at_sup + + + + + def eval_at_sup(self): + + localctx = LaTeXParser.Eval_at_supContext(self, self._ctx, self.state) + self.enterRule(localctx, 28, self.RULE_eval_at_sup) + try: + self.enterOuterAlt(localctx, 1) + self.state = 188 + self.match(LaTeXParser.CARET) + self.state = 189 + self.match(LaTeXParser.L_BRACE) + self.state = 192 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,13,self._ctx) + if la_ == 1: + self.state = 190 + self.expr() + pass + + elif la_ == 2: + self.state = 191 + self.equality() + pass + + + self.state = 194 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExpContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def comp(self): + return self.getTypedRuleContext(LaTeXParser.CompContext,0) + + + def exp(self): + return self.getTypedRuleContext(LaTeXParser.ExpContext,0) + + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_exp + + + + def exp(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.ExpContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 30 + self.enterRecursionRule(localctx, 30, self.RULE_exp, _p) + try: + self.enterOuterAlt(localctx, 1) + self.state = 197 + self.comp() + self._ctx.stop = self._input.LT(-1) + self.state = 213 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,16,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.ExpContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_exp) + self.state = 199 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 200 + self.match(LaTeXParser.CARET) + self.state = 206 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 201 + self.atom() + pass + elif token in [21]: + self.state = 202 + self.match(LaTeXParser.L_BRACE) + self.state = 203 + self.expr() + self.state = 204 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 209 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,15,self._ctx) + if la_ == 1: + self.state = 208 + self.subexpr() + + + self.state = 215 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,16,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class Exp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def comp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Comp_nofuncContext,0) + + + def exp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Exp_nofuncContext,0) + + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_exp_nofunc + + + + def exp_nofunc(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.Exp_nofuncContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 32 + self.enterRecursionRule(localctx, 32, self.RULE_exp_nofunc, _p) + try: + self.enterOuterAlt(localctx, 1) + self.state = 217 + self.comp_nofunc() + self._ctx.stop = self._input.LT(-1) + self.state = 233 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,19,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.Exp_nofuncContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_exp_nofunc) + self.state = 219 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 220 + self.match(LaTeXParser.CARET) + self.state = 226 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 221 + self.atom() + pass + elif token in [21]: + self.state = 222 + self.match(LaTeXParser.L_BRACE) + self.state = 223 + self.expr() + self.state = 224 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 229 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,18,self._ctx) + if la_ == 1: + self.state = 228 + self.subexpr() + + + self.state = 235 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,19,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class CompContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def group(self): + return self.getTypedRuleContext(LaTeXParser.GroupContext,0) + + + def abs_group(self): + return self.getTypedRuleContext(LaTeXParser.Abs_groupContext,0) + + + def func(self): + return self.getTypedRuleContext(LaTeXParser.FuncContext,0) + + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def floor(self): + return self.getTypedRuleContext(LaTeXParser.FloorContext,0) + + + def ceil(self): + return self.getTypedRuleContext(LaTeXParser.CeilContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_comp + + + + + def comp(self): + + localctx = LaTeXParser.CompContext(self, self._ctx, self.state) + self.enterRule(localctx, 34, self.RULE_comp) + try: + self.state = 242 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,20,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 236 + self.group() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 237 + self.abs_group() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 238 + self.func() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 239 + self.atom() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 240 + self.floor() + pass + + elif la_ == 6: + self.enterOuterAlt(localctx, 6) + self.state = 241 + self.ceil() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Comp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def group(self): + return self.getTypedRuleContext(LaTeXParser.GroupContext,0) + + + def abs_group(self): + return self.getTypedRuleContext(LaTeXParser.Abs_groupContext,0) + + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def floor(self): + return self.getTypedRuleContext(LaTeXParser.FloorContext,0) + + + def ceil(self): + return self.getTypedRuleContext(LaTeXParser.CeilContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_comp_nofunc + + + + + def comp_nofunc(self): + + localctx = LaTeXParser.Comp_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 36, self.RULE_comp_nofunc) + try: + self.state = 249 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,21,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 244 + self.group() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 245 + self.abs_group() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 246 + self.atom() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 247 + self.floor() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 248 + self.ceil() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class GroupContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def L_PAREN(self): + return self.getToken(LaTeXParser.L_PAREN, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_PAREN(self): + return self.getToken(LaTeXParser.R_PAREN, 0) + + def L_BRACKET(self): + return self.getToken(LaTeXParser.L_BRACKET, 0) + + def R_BRACKET(self): + return self.getToken(LaTeXParser.R_BRACKET, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def L_BRACE_LITERAL(self): + return self.getToken(LaTeXParser.L_BRACE_LITERAL, 0) + + def R_BRACE_LITERAL(self): + return self.getToken(LaTeXParser.R_BRACE_LITERAL, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_group + + + + + def group(self): + + localctx = LaTeXParser.GroupContext(self, self._ctx, self.state) + self.enterRule(localctx, 38, self.RULE_group) + try: + self.state = 267 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [19]: + self.enterOuterAlt(localctx, 1) + self.state = 251 + self.match(LaTeXParser.L_PAREN) + self.state = 252 + self.expr() + self.state = 253 + self.match(LaTeXParser.R_PAREN) + pass + elif token in [25]: + self.enterOuterAlt(localctx, 2) + self.state = 255 + self.match(LaTeXParser.L_BRACKET) + self.state = 256 + self.expr() + self.state = 257 + self.match(LaTeXParser.R_BRACKET) + pass + elif token in [21]: + self.enterOuterAlt(localctx, 3) + self.state = 259 + self.match(LaTeXParser.L_BRACE) + self.state = 260 + self.expr() + self.state = 261 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [23]: + self.enterOuterAlt(localctx, 4) + self.state = 263 + self.match(LaTeXParser.L_BRACE_LITERAL) + self.state = 264 + self.expr() + self.state = 265 + self.match(LaTeXParser.R_BRACE_LITERAL) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Abs_groupContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BAR(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.BAR) + else: + return self.getToken(LaTeXParser.BAR, i) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_abs_group + + + + + def abs_group(self): + + localctx = LaTeXParser.Abs_groupContext(self, self._ctx, self.state) + self.enterRule(localctx, 40, self.RULE_abs_group) + try: + self.enterOuterAlt(localctx, 1) + self.state = 269 + self.match(LaTeXParser.BAR) + self.state = 270 + self.expr() + self.state = 271 + self.match(LaTeXParser.BAR) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class NumberContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def DIGIT(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.DIGIT) + else: + return self.getToken(LaTeXParser.DIGIT, i) + + def getRuleIndex(self): + return LaTeXParser.RULE_number + + + + + def number(self): + + localctx = LaTeXParser.NumberContext(self, self._ctx, self.state) + self.enterRule(localctx, 42, self.RULE_number) + try: + self.enterOuterAlt(localctx, 1) + self.state = 274 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 273 + self.match(LaTeXParser.DIGIT) + + else: + raise NoViableAltException(self) + self.state = 276 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,23,self._ctx) + + self.state = 284 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,24,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 278 + self.match(LaTeXParser.T__0) + self.state = 279 + self.match(LaTeXParser.DIGIT) + self.state = 280 + self.match(LaTeXParser.DIGIT) + self.state = 281 + self.match(LaTeXParser.DIGIT) + self.state = 286 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,24,self._ctx) + + self.state = 293 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,26,self._ctx) + if la_ == 1: + self.state = 287 + self.match(LaTeXParser.T__1) + self.state = 289 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 288 + self.match(LaTeXParser.DIGIT) + + else: + raise NoViableAltException(self) + self.state = 291 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,25,self._ctx) + + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AtomContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def SINGLE_QUOTES(self): + return self.getToken(LaTeXParser.SINGLE_QUOTES, 0) + + def number(self): + return self.getTypedRuleContext(LaTeXParser.NumberContext,0) + + + def DIFFERENTIAL(self): + return self.getToken(LaTeXParser.DIFFERENTIAL, 0) + + def mathit(self): + return self.getTypedRuleContext(LaTeXParser.MathitContext,0) + + + def frac(self): + return self.getTypedRuleContext(LaTeXParser.FracContext,0) + + + def binom(self): + return self.getTypedRuleContext(LaTeXParser.BinomContext,0) + + + def bra(self): + return self.getTypedRuleContext(LaTeXParser.BraContext,0) + + + def ket(self): + return self.getTypedRuleContext(LaTeXParser.KetContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_atom + + + + + def atom(self): + + localctx = LaTeXParser.AtomContext(self, self._ctx, self.state) + self.enterRule(localctx, 44, self.RULE_atom) + self._la = 0 # Token type + try: + self.state = 317 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [77, 91]: + self.enterOuterAlt(localctx, 1) + self.state = 295 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 308 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,31,self._ctx) + if la_ == 1: + self.state = 297 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,27,self._ctx) + if la_ == 1: + self.state = 296 + self.subexpr() + + + self.state = 300 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,28,self._ctx) + if la_ == 1: + self.state = 299 + self.match(LaTeXParser.SINGLE_QUOTES) + + + pass + + elif la_ == 2: + self.state = 303 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,29,self._ctx) + if la_ == 1: + self.state = 302 + self.match(LaTeXParser.SINGLE_QUOTES) + + + self.state = 306 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,30,self._ctx) + if la_ == 1: + self.state = 305 + self.subexpr() + + + pass + + + pass + elif token in [78]: + self.enterOuterAlt(localctx, 2) + self.state = 310 + self.number() + pass + elif token in [76]: + self.enterOuterAlt(localctx, 3) + self.state = 311 + self.match(LaTeXParser.DIFFERENTIAL) + pass + elif token in [72]: + self.enterOuterAlt(localctx, 4) + self.state = 312 + self.mathit() + pass + elif token in [68]: + self.enterOuterAlt(localctx, 5) + self.state = 313 + self.frac() + pass + elif token in [69, 70, 71]: + self.enterOuterAlt(localctx, 6) + self.state = 314 + self.binom() + pass + elif token in [30]: + self.enterOuterAlt(localctx, 7) + self.state = 315 + self.bra() + pass + elif token in [27, 29]: + self.enterOuterAlt(localctx, 8) + self.state = 316 + self.ket() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class BraContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def L_ANGLE(self): + return self.getToken(LaTeXParser.L_ANGLE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BAR(self): + return self.getToken(LaTeXParser.R_BAR, 0) + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_bra + + + + + def bra(self): + + localctx = LaTeXParser.BraContext(self, self._ctx, self.state) + self.enterRule(localctx, 46, self.RULE_bra) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 319 + self.match(LaTeXParser.L_ANGLE) + self.state = 320 + self.expr() + self.state = 321 + _la = self._input.LA(1) + if not(_la==27 or _la==28): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class KetContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_ANGLE(self): + return self.getToken(LaTeXParser.R_ANGLE, 0) + + def L_BAR(self): + return self.getToken(LaTeXParser.L_BAR, 0) + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_ket + + + + + def ket(self): + + localctx = LaTeXParser.KetContext(self, self._ctx, self.state) + self.enterRule(localctx, 48, self.RULE_ket) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 323 + _la = self._input.LA(1) + if not(_la==27 or _la==29): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 324 + self.expr() + self.state = 325 + self.match(LaTeXParser.R_ANGLE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MathitContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CMD_MATHIT(self): + return self.getToken(LaTeXParser.CMD_MATHIT, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def mathit_text(self): + return self.getTypedRuleContext(LaTeXParser.Mathit_textContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mathit + + + + + def mathit(self): + + localctx = LaTeXParser.MathitContext(self, self._ctx, self.state) + self.enterRule(localctx, 50, self.RULE_mathit) + try: + self.enterOuterAlt(localctx, 1) + self.state = 327 + self.match(LaTeXParser.CMD_MATHIT) + self.state = 328 + self.match(LaTeXParser.L_BRACE) + self.state = 329 + self.mathit_text() + self.state = 330 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Mathit_textContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def LETTER(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.LETTER) + else: + return self.getToken(LaTeXParser.LETTER, i) + + def getRuleIndex(self): + return LaTeXParser.RULE_mathit_text + + + + + def mathit_text(self): + + localctx = LaTeXParser.Mathit_textContext(self, self._ctx, self.state) + self.enterRule(localctx, 52, self.RULE_mathit_text) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 335 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==77: + self.state = 332 + self.match(LaTeXParser.LETTER) + self.state = 337 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FracContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.upperd = None # Token + self.upper = None # ExprContext + self.lowerd = None # Token + self.lower = None # ExprContext + + def CMD_FRAC(self): + return self.getToken(LaTeXParser.CMD_FRAC, 0) + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def DIGIT(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.DIGIT) + else: + return self.getToken(LaTeXParser.DIGIT, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_frac + + + + + def frac(self): + + localctx = LaTeXParser.FracContext(self, self._ctx, self.state) + self.enterRule(localctx, 54, self.RULE_frac) + try: + self.enterOuterAlt(localctx, 1) + self.state = 338 + self.match(LaTeXParser.CMD_FRAC) + self.state = 344 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [78]: + self.state = 339 + localctx.upperd = self.match(LaTeXParser.DIGIT) + pass + elif token in [21]: + self.state = 340 + self.match(LaTeXParser.L_BRACE) + self.state = 341 + localctx.upper = self.expr() + self.state = 342 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 351 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [78]: + self.state = 346 + localctx.lowerd = self.match(LaTeXParser.DIGIT) + pass + elif token in [21]: + self.state = 347 + self.match(LaTeXParser.L_BRACE) + self.state = 348 + localctx.lower = self.expr() + self.state = 349 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class BinomContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.n = None # ExprContext + self.k = None # ExprContext + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def CMD_BINOM(self): + return self.getToken(LaTeXParser.CMD_BINOM, 0) + + def CMD_DBINOM(self): + return self.getToken(LaTeXParser.CMD_DBINOM, 0) + + def CMD_TBINOM(self): + return self.getToken(LaTeXParser.CMD_TBINOM, 0) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_binom + + + + + def binom(self): + + localctx = LaTeXParser.BinomContext(self, self._ctx, self.state) + self.enterRule(localctx, 56, self.RULE_binom) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 353 + _la = self._input.LA(1) + if not((((_la - 69)) & ~0x3f) == 0 and ((1 << (_la - 69)) & 7) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 354 + self.match(LaTeXParser.L_BRACE) + self.state = 355 + localctx.n = self.expr() + self.state = 356 + self.match(LaTeXParser.R_BRACE) + self.state = 357 + self.match(LaTeXParser.L_BRACE) + self.state = 358 + localctx.k = self.expr() + self.state = 359 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FloorContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.val = None # ExprContext + + def L_FLOOR(self): + return self.getToken(LaTeXParser.L_FLOOR, 0) + + def R_FLOOR(self): + return self.getToken(LaTeXParser.R_FLOOR, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_floor + + + + + def floor(self): + + localctx = LaTeXParser.FloorContext(self, self._ctx, self.state) + self.enterRule(localctx, 58, self.RULE_floor) + try: + self.enterOuterAlt(localctx, 1) + self.state = 361 + self.match(LaTeXParser.L_FLOOR) + self.state = 362 + localctx.val = self.expr() + self.state = 363 + self.match(LaTeXParser.R_FLOOR) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CeilContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.val = None # ExprContext + + def L_CEIL(self): + return self.getToken(LaTeXParser.L_CEIL, 0) + + def R_CEIL(self): + return self.getToken(LaTeXParser.R_CEIL, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_ceil + + + + + def ceil(self): + + localctx = LaTeXParser.CeilContext(self, self._ctx, self.state) + self.enterRule(localctx, 60, self.RULE_ceil) + try: + self.enterOuterAlt(localctx, 1) + self.state = 365 + self.match(LaTeXParser.L_CEIL) + self.state = 366 + localctx.val = self.expr() + self.state = 367 + self.match(LaTeXParser.R_CEIL) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_normalContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def FUNC_EXP(self): + return self.getToken(LaTeXParser.FUNC_EXP, 0) + + def FUNC_LOG(self): + return self.getToken(LaTeXParser.FUNC_LOG, 0) + + def FUNC_LG(self): + return self.getToken(LaTeXParser.FUNC_LG, 0) + + def FUNC_LN(self): + return self.getToken(LaTeXParser.FUNC_LN, 0) + + def FUNC_SIN(self): + return self.getToken(LaTeXParser.FUNC_SIN, 0) + + def FUNC_COS(self): + return self.getToken(LaTeXParser.FUNC_COS, 0) + + def FUNC_TAN(self): + return self.getToken(LaTeXParser.FUNC_TAN, 0) + + def FUNC_CSC(self): + return self.getToken(LaTeXParser.FUNC_CSC, 0) + + def FUNC_SEC(self): + return self.getToken(LaTeXParser.FUNC_SEC, 0) + + def FUNC_COT(self): + return self.getToken(LaTeXParser.FUNC_COT, 0) + + def FUNC_ARCSIN(self): + return self.getToken(LaTeXParser.FUNC_ARCSIN, 0) + + def FUNC_ARCCOS(self): + return self.getToken(LaTeXParser.FUNC_ARCCOS, 0) + + def FUNC_ARCTAN(self): + return self.getToken(LaTeXParser.FUNC_ARCTAN, 0) + + def FUNC_ARCCSC(self): + return self.getToken(LaTeXParser.FUNC_ARCCSC, 0) + + def FUNC_ARCSEC(self): + return self.getToken(LaTeXParser.FUNC_ARCSEC, 0) + + def FUNC_ARCCOT(self): + return self.getToken(LaTeXParser.FUNC_ARCCOT, 0) + + def FUNC_SINH(self): + return self.getToken(LaTeXParser.FUNC_SINH, 0) + + def FUNC_COSH(self): + return self.getToken(LaTeXParser.FUNC_COSH, 0) + + def FUNC_TANH(self): + return self.getToken(LaTeXParser.FUNC_TANH, 0) + + def FUNC_ARSINH(self): + return self.getToken(LaTeXParser.FUNC_ARSINH, 0) + + def FUNC_ARCOSH(self): + return self.getToken(LaTeXParser.FUNC_ARCOSH, 0) + + def FUNC_ARTANH(self): + return self.getToken(LaTeXParser.FUNC_ARTANH, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_func_normal + + + + + def func_normal(self): + + localctx = LaTeXParser.Func_normalContext(self, self._ctx, self.state) + self.enterRule(localctx, 62, self.RULE_func_normal) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 369 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 576460614864470016) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.root = None # ExprContext + self.base = None # ExprContext + + def func_normal(self): + return self.getTypedRuleContext(LaTeXParser.Func_normalContext,0) + + + def L_PAREN(self): + return self.getToken(LaTeXParser.L_PAREN, 0) + + def func_arg(self): + return self.getTypedRuleContext(LaTeXParser.Func_argContext,0) + + + def R_PAREN(self): + return self.getToken(LaTeXParser.R_PAREN, 0) + + def func_arg_noparens(self): + return self.getTypedRuleContext(LaTeXParser.Func_arg_noparensContext,0) + + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def supexpr(self): + return self.getTypedRuleContext(LaTeXParser.SupexprContext,0) + + + def args(self): + return self.getTypedRuleContext(LaTeXParser.ArgsContext,0) + + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def SINGLE_QUOTES(self): + return self.getToken(LaTeXParser.SINGLE_QUOTES, 0) + + def FUNC_INT(self): + return self.getToken(LaTeXParser.FUNC_INT, 0) + + def DIFFERENTIAL(self): + return self.getToken(LaTeXParser.DIFFERENTIAL, 0) + + def frac(self): + return self.getTypedRuleContext(LaTeXParser.FracContext,0) + + + def additive(self): + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,0) + + + def FUNC_SQRT(self): + return self.getToken(LaTeXParser.FUNC_SQRT, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def L_BRACKET(self): + return self.getToken(LaTeXParser.L_BRACKET, 0) + + def R_BRACKET(self): + return self.getToken(LaTeXParser.R_BRACKET, 0) + + def FUNC_OVERLINE(self): + return self.getToken(LaTeXParser.FUNC_OVERLINE, 0) + + def mp(self): + return self.getTypedRuleContext(LaTeXParser.MpContext,0) + + + def FUNC_SUM(self): + return self.getToken(LaTeXParser.FUNC_SUM, 0) + + def FUNC_PROD(self): + return self.getToken(LaTeXParser.FUNC_PROD, 0) + + def subeq(self): + return self.getTypedRuleContext(LaTeXParser.SubeqContext,0) + + + def FUNC_LIM(self): + return self.getToken(LaTeXParser.FUNC_LIM, 0) + + def limit_sub(self): + return self.getTypedRuleContext(LaTeXParser.Limit_subContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func + + + + + def func(self): + + localctx = LaTeXParser.FuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 64, self.RULE_func) + self._la = 0 # Token type + try: + self.state = 460 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58]: + self.enterOuterAlt(localctx, 1) + self.state = 371 + self.func_normal() + self.state = 384 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,40,self._ctx) + if la_ == 1: + self.state = 373 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 372 + self.subexpr() + + + self.state = 376 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 375 + self.supexpr() + + + pass + + elif la_ == 2: + self.state = 379 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 378 + self.supexpr() + + + self.state = 382 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 381 + self.subexpr() + + + pass + + + self.state = 391 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,41,self._ctx) + if la_ == 1: + self.state = 386 + self.match(LaTeXParser.L_PAREN) + self.state = 387 + self.func_arg() + self.state = 388 + self.match(LaTeXParser.R_PAREN) + pass + + elif la_ == 2: + self.state = 390 + self.func_arg_noparens() + pass + + + pass + elif token in [77, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 393 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 406 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,46,self._ctx) + if la_ == 1: + self.state = 395 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 394 + self.subexpr() + + + self.state = 398 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==90: + self.state = 397 + self.match(LaTeXParser.SINGLE_QUOTES) + + + pass + + elif la_ == 2: + self.state = 401 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==90: + self.state = 400 + self.match(LaTeXParser.SINGLE_QUOTES) + + + self.state = 404 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 403 + self.subexpr() + + + pass + + + self.state = 408 + self.match(LaTeXParser.L_PAREN) + self.state = 409 + self.args() + self.state = 410 + self.match(LaTeXParser.R_PAREN) + pass + elif token in [34]: + self.enterOuterAlt(localctx, 3) + self.state = 412 + self.match(LaTeXParser.FUNC_INT) + self.state = 419 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [73]: + self.state = 413 + self.subexpr() + self.state = 414 + self.supexpr() + pass + elif token in [74]: + self.state = 416 + self.supexpr() + self.state = 417 + self.subexpr() + pass + elif token in [15, 16, 19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + pass + else: + pass + self.state = 427 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,49,self._ctx) + if la_ == 1: + self.state = 422 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,48,self._ctx) + if la_ == 1: + self.state = 421 + self.additive(0) + + + self.state = 424 + self.match(LaTeXParser.DIFFERENTIAL) + pass + + elif la_ == 2: + self.state = 425 + self.frac() + pass + + elif la_ == 3: + self.state = 426 + self.additive(0) + pass + + + pass + elif token in [63]: + self.enterOuterAlt(localctx, 4) + self.state = 429 + self.match(LaTeXParser.FUNC_SQRT) + self.state = 434 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==25: + self.state = 430 + self.match(LaTeXParser.L_BRACKET) + self.state = 431 + localctx.root = self.expr() + self.state = 432 + self.match(LaTeXParser.R_BRACKET) + + + self.state = 436 + self.match(LaTeXParser.L_BRACE) + self.state = 437 + localctx.base = self.expr() + self.state = 438 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [64]: + self.enterOuterAlt(localctx, 5) + self.state = 440 + self.match(LaTeXParser.FUNC_OVERLINE) + self.state = 441 + self.match(LaTeXParser.L_BRACE) + self.state = 442 + localctx.base = self.expr() + self.state = 443 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [35, 36]: + self.enterOuterAlt(localctx, 6) + self.state = 445 + _la = self._input.LA(1) + if not(_la==35 or _la==36): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 452 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [73]: + self.state = 446 + self.subeq() + self.state = 447 + self.supexpr() + pass + elif token in [74]: + self.state = 449 + self.supexpr() + self.state = 450 + self.subeq() + pass + else: + raise NoViableAltException(self) + + self.state = 454 + self.mp(0) + pass + elif token in [32]: + self.enterOuterAlt(localctx, 7) + self.state = 456 + self.match(LaTeXParser.FUNC_LIM) + self.state = 457 + self.limit_sub() + self.state = 458 + self.mp(0) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ArgsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def args(self): + return self.getTypedRuleContext(LaTeXParser.ArgsContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_args + + + + + def args(self): + + localctx = LaTeXParser.ArgsContext(self, self._ctx, self.state) + self.enterRule(localctx, 66, self.RULE_args) + try: + self.state = 467 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,53,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 462 + self.expr() + self.state = 463 + self.match(LaTeXParser.T__0) + self.state = 464 + self.args() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 466 + self.expr() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Limit_subContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def LIM_APPROACH_SYM(self): + return self.getToken(LaTeXParser.LIM_APPROACH_SYM, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_limit_sub + + + + + def limit_sub(self): + + localctx = LaTeXParser.Limit_subContext(self, self._ctx, self.state) + self.enterRule(localctx, 68, self.RULE_limit_sub) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 469 + self.match(LaTeXParser.UNDERSCORE) + self.state = 470 + self.match(LaTeXParser.L_BRACE) + self.state = 471 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 472 + self.match(LaTeXParser.LIM_APPROACH_SYM) + self.state = 473 + self.expr() + self.state = 482 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 474 + self.match(LaTeXParser.CARET) + self.state = 480 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [21]: + self.state = 475 + self.match(LaTeXParser.L_BRACE) + self.state = 476 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 477 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [15]: + self.state = 478 + self.match(LaTeXParser.ADD) + pass + elif token in [16]: + self.state = 479 + self.match(LaTeXParser.SUB) + pass + else: + raise NoViableAltException(self) + + + + self.state = 484 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_argContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def func_arg(self): + return self.getTypedRuleContext(LaTeXParser.Func_argContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func_arg + + + + + def func_arg(self): + + localctx = LaTeXParser.Func_argContext(self, self._ctx, self.state) + self.enterRule(localctx, 70, self.RULE_func_arg) + try: + self.state = 491 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,56,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 486 + self.expr() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 487 + self.expr() + self.state = 488 + self.match(LaTeXParser.T__0) + self.state = 489 + self.func_arg() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_arg_noparensContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def mp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Mp_nofuncContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func_arg_noparens + + + + + def func_arg_noparens(self): + + localctx = LaTeXParser.Func_arg_noparensContext(self, self._ctx, self.state) + self.enterRule(localctx, 72, self.RULE_func_arg_noparens) + try: + self.enterOuterAlt(localctx, 1) + self.state = 493 + self.mp_nofunc(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SubexprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_subexpr + + + + + def subexpr(self): + + localctx = LaTeXParser.SubexprContext(self, self._ctx, self.state) + self.enterRule(localctx, 74, self.RULE_subexpr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 495 + self.match(LaTeXParser.UNDERSCORE) + self.state = 501 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 496 + self.atom() + pass + elif token in [21]: + self.state = 497 + self.match(LaTeXParser.L_BRACE) + self.state = 498 + self.expr() + self.state = 499 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SupexprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_supexpr + + + + + def supexpr(self): + + localctx = LaTeXParser.SupexprContext(self, self._ctx, self.state) + self.enterRule(localctx, 76, self.RULE_supexpr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 503 + self.match(LaTeXParser.CARET) + self.state = 509 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 504 + self.atom() + pass + elif token in [21]: + self.state = 505 + self.match(LaTeXParser.L_BRACE) + self.state = 506 + self.expr() + self.state = 507 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SubeqContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_subeq + + + + + def subeq(self): + + localctx = LaTeXParser.SubeqContext(self, self._ctx, self.state) + self.enterRule(localctx, 78, self.RULE_subeq) + try: + self.enterOuterAlt(localctx, 1) + self.state = 511 + self.match(LaTeXParser.UNDERSCORE) + self.state = 512 + self.match(LaTeXParser.L_BRACE) + self.state = 513 + self.equality() + self.state = 514 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SupeqContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_supeq + + + + + def supeq(self): + + localctx = LaTeXParser.SupeqContext(self, self._ctx, self.state) + self.enterRule(localctx, 80, self.RULE_supeq) + try: + self.enterOuterAlt(localctx, 1) + self.state = 516 + self.match(LaTeXParser.UNDERSCORE) + self.state = 517 + self.match(LaTeXParser.L_BRACE) + self.state = 518 + self.equality() + self.state = 519 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + + def sempred(self, localctx:RuleContext, ruleIndex:int, predIndex:int): + if self._predicates == None: + self._predicates = dict() + self._predicates[1] = self.relation_sempred + self._predicates[4] = self.additive_sempred + self._predicates[5] = self.mp_sempred + self._predicates[6] = self.mp_nofunc_sempred + self._predicates[15] = self.exp_sempred + self._predicates[16] = self.exp_nofunc_sempred + pred = self._predicates.get(ruleIndex, None) + if pred is None: + raise Exception("No predicate with index:" + str(ruleIndex)) + else: + return pred(localctx, predIndex) + + def relation_sempred(self, localctx:RelationContext, predIndex:int): + if predIndex == 0: + return self.precpred(self._ctx, 2) + + + def additive_sempred(self, localctx:AdditiveContext, predIndex:int): + if predIndex == 1: + return self.precpred(self._ctx, 2) + + + def mp_sempred(self, localctx:MpContext, predIndex:int): + if predIndex == 2: + return self.precpred(self._ctx, 2) + + + def mp_nofunc_sempred(self, localctx:Mp_nofuncContext, predIndex:int): + if predIndex == 3: + return self.precpred(self._ctx, 2) + + + def exp_sempred(self, localctx:ExpContext, predIndex:int): + if predIndex == 4: + return self.precpred(self._ctx, 2) + + + def exp_nofunc_sempred(self, localctx:Exp_nofuncContext, predIndex:int): + if predIndex == 5: + return self.precpred(self._ctx, 2) + + + + + diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..ee50da5b7861154823812c7773360b53dfd29ff6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py @@ -0,0 +1,91 @@ +import os +import subprocess +import glob + +from sympy.utilities.misc import debug + +here = os.path.dirname(__file__) +grammar_file = os.path.abspath(os.path.join(here, "LaTeX.g4")) +dir_latex_antlr = os.path.join(here, "_antlr") + +header = '''\ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +''' + + +def check_antlr_version(): + debug("Checking antlr4 version...") + + try: + debug(subprocess.check_output(["antlr4"]) + .decode('utf-8').split("\n")[0]) + return True + except (subprocess.CalledProcessError, FileNotFoundError): + debug("The 'antlr4' command line tool is not installed, " + "or not on your PATH.\n" + "> Please refer to the README.md file for more information.") + return False + + +def build_parser(output_dir=dir_latex_antlr): + check_antlr_version() + + debug("Updating ANTLR-generated code in {}".format(output_dir)) + + if not os.path.exists(output_dir): + os.makedirs(output_dir) + + with open(os.path.join(output_dir, "__init__.py"), "w+") as fp: + fp.write(header) + + args = [ + "antlr4", + grammar_file, + "-o", output_dir, + # for now, not generating these as latex2sympy did not use them + "-no-visitor", + "-no-listener", + ] + + debug("Running code generation...\n\t$ {}".format(" ".join(args))) + subprocess.check_output(args, cwd=output_dir) + + debug("Applying headers, removing unnecessary files and renaming...") + # Handle case insensitive file systems. If the files are already + # generated, they will be written to latex* but LaTeX*.* won't match them. + for path in (glob.glob(os.path.join(output_dir, "LaTeX*.*")) or + glob.glob(os.path.join(output_dir, "latex*.*"))): + + # Remove files ending in .interp or .tokens as they are not needed. + if not path.endswith(".py"): + os.unlink(path) + continue + + new_path = os.path.join(output_dir, os.path.basename(path).lower()) + with open(path, 'r') as f: + lines = [line.rstrip() + '\n' for line in f] + + os.unlink(path) + + with open(new_path, "w") as out_file: + offset = 0 + while lines[offset].startswith('#'): + offset += 1 + out_file.write(header) + out_file.writelines(lines[offset:]) + + debug("\t{}".format(new_path)) + + return True + + +if __name__ == "__main__": + build_parser() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..26604375b3a9622f8c1dacdb1d678d09c2c3ad41 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py @@ -0,0 +1,607 @@ +# Ported from latex2sympy by @augustt198 +# https://github.com/augustt198/latex2sympy +# See license in LICENSE.txt +from importlib.metadata import version +import sympy +from sympy.external import import_module +from sympy.printing.str import StrPrinter +from sympy.physics.quantum.state import Bra, Ket + +from .errors import LaTeXParsingError + + +LaTeXParser = LaTeXLexer = MathErrorListener = None + +try: + LaTeXParser = import_module('sympy.parsing.latex._antlr.latexparser', + import_kwargs={'fromlist': ['LaTeXParser']}).LaTeXParser + LaTeXLexer = import_module('sympy.parsing.latex._antlr.latexlexer', + import_kwargs={'fromlist': ['LaTeXLexer']}).LaTeXLexer +except Exception: + pass + +ErrorListener = import_module('antlr4.error.ErrorListener', + warn_not_installed=True, + import_kwargs={'fromlist': ['ErrorListener']} + ) + + + +if ErrorListener: + class MathErrorListener(ErrorListener.ErrorListener): # type:ignore # noqa:F811 + def __init__(self, src): + super(ErrorListener.ErrorListener, self).__init__() + self.src = src + + def syntaxError(self, recog, symbol, line, col, msg, e): + fmt = "%s\n%s\n%s" + marker = "~" * col + "^" + + if msg.startswith("missing"): + err = fmt % (msg, self.src, marker) + elif msg.startswith("no viable"): + err = fmt % ("I expected something else here", self.src, marker) + elif msg.startswith("mismatched"): + names = LaTeXParser.literalNames + expected = [ + names[i] for i in e.getExpectedTokens() if i < len(names) + ] + if len(expected) < 10: + expected = " ".join(expected) + err = (fmt % ("I expected one of these: " + expected, self.src, + marker)) + else: + err = (fmt % ("I expected something else here", self.src, + marker)) + else: + err = fmt % ("I don't understand this", self.src, marker) + raise LaTeXParsingError(err) + + +def parse_latex(sympy, strict=False): + antlr4 = import_module('antlr4') + + if None in [antlr4, MathErrorListener] or \ + not version('antlr4-python3-runtime').startswith('4.11'): + raise ImportError("LaTeX parsing requires the antlr4 Python package," + " provided by pip (antlr4-python3-runtime) or" + " conda (antlr-python-runtime), version 4.11") + + sympy = sympy.strip() + matherror = MathErrorListener(sympy) + + stream = antlr4.InputStream(sympy) + lex = LaTeXLexer(stream) + lex.removeErrorListeners() + lex.addErrorListener(matherror) + + tokens = antlr4.CommonTokenStream(lex) + parser = LaTeXParser(tokens) + + # remove default console error listener + parser.removeErrorListeners() + parser.addErrorListener(matherror) + + relation = parser.math().relation() + if strict and (relation.start.start != 0 or relation.stop.stop != len(sympy) - 1): + raise LaTeXParsingError("Invalid LaTeX") + expr = convert_relation(relation) + + return expr + + +def convert_relation(rel): + if rel.expr(): + return convert_expr(rel.expr()) + + lh = convert_relation(rel.relation(0)) + rh = convert_relation(rel.relation(1)) + if rel.LT(): + return sympy.StrictLessThan(lh, rh) + elif rel.LTE(): + return sympy.LessThan(lh, rh) + elif rel.GT(): + return sympy.StrictGreaterThan(lh, rh) + elif rel.GTE(): + return sympy.GreaterThan(lh, rh) + elif rel.EQUAL(): + return sympy.Eq(lh, rh) + elif rel.NEQ(): + return sympy.Ne(lh, rh) + + +def convert_expr(expr): + return convert_add(expr.additive()) + + +def convert_add(add): + if add.ADD(): + lh = convert_add(add.additive(0)) + rh = convert_add(add.additive(1)) + return sympy.Add(lh, rh, evaluate=False) + elif add.SUB(): + lh = convert_add(add.additive(0)) + rh = convert_add(add.additive(1)) + if hasattr(rh, "is_Atom") and rh.is_Atom: + return sympy.Add(lh, -1 * rh, evaluate=False) + return sympy.Add(lh, sympy.Mul(-1, rh, evaluate=False), evaluate=False) + else: + return convert_mp(add.mp()) + + +def convert_mp(mp): + if hasattr(mp, 'mp'): + mp_left = mp.mp(0) + mp_right = mp.mp(1) + else: + mp_left = mp.mp_nofunc(0) + mp_right = mp.mp_nofunc(1) + + if mp.MUL() or mp.CMD_TIMES() or mp.CMD_CDOT(): + lh = convert_mp(mp_left) + rh = convert_mp(mp_right) + return sympy.Mul(lh, rh, evaluate=False) + elif mp.DIV() or mp.CMD_DIV() or mp.COLON(): + lh = convert_mp(mp_left) + rh = convert_mp(mp_right) + return sympy.Mul(lh, sympy.Pow(rh, -1, evaluate=False), evaluate=False) + else: + if hasattr(mp, 'unary'): + return convert_unary(mp.unary()) + else: + return convert_unary(mp.unary_nofunc()) + + +def convert_unary(unary): + if hasattr(unary, 'unary'): + nested_unary = unary.unary() + else: + nested_unary = unary.unary_nofunc() + if hasattr(unary, 'postfix_nofunc'): + first = unary.postfix() + tail = unary.postfix_nofunc() + postfix = [first] + tail + else: + postfix = unary.postfix() + + if unary.ADD(): + return convert_unary(nested_unary) + elif unary.SUB(): + numabs = convert_unary(nested_unary) + # Use Integer(-n) instead of Mul(-1, n) + return -numabs + elif postfix: + return convert_postfix_list(postfix) + + +def convert_postfix_list(arr, i=0): + if i >= len(arr): + raise LaTeXParsingError("Index out of bounds") + + res = convert_postfix(arr[i]) + if isinstance(res, sympy.Expr): + if i == len(arr) - 1: + return res # nothing to multiply by + else: + if i > 0: + left = convert_postfix(arr[i - 1]) + right = convert_postfix(arr[i + 1]) + if isinstance(left, sympy.Expr) and isinstance( + right, sympy.Expr): + left_syms = convert_postfix(arr[i - 1]).atoms(sympy.Symbol) + right_syms = convert_postfix(arr[i + 1]).atoms( + sympy.Symbol) + # if the left and right sides contain no variables and the + # symbol in between is 'x', treat as multiplication. + if not (left_syms or right_syms) and str(res) == 'x': + return convert_postfix_list(arr, i + 1) + # multiply by next + return sympy.Mul( + res, convert_postfix_list(arr, i + 1), evaluate=False) + else: # must be derivative + wrt = res[0] + if i == len(arr) - 1: + raise LaTeXParsingError("Expected expression for derivative") + else: + expr = convert_postfix_list(arr, i + 1) + return sympy.Derivative(expr, wrt) + + +def do_subs(expr, at): + if at.expr(): + at_expr = convert_expr(at.expr()) + syms = at_expr.atoms(sympy.Symbol) + if len(syms) == 0: + return expr + elif len(syms) > 0: + sym = next(iter(syms)) + return expr.subs(sym, at_expr) + elif at.equality(): + lh = convert_expr(at.equality().expr(0)) + rh = convert_expr(at.equality().expr(1)) + return expr.subs(lh, rh) + + +def convert_postfix(postfix): + if hasattr(postfix, 'exp'): + exp_nested = postfix.exp() + else: + exp_nested = postfix.exp_nofunc() + + exp = convert_exp(exp_nested) + for op in postfix.postfix_op(): + if op.BANG(): + if isinstance(exp, list): + raise LaTeXParsingError("Cannot apply postfix to derivative") + exp = sympy.factorial(exp, evaluate=False) + elif op.eval_at(): + ev = op.eval_at() + at_b = None + at_a = None + if ev.eval_at_sup(): + at_b = do_subs(exp, ev.eval_at_sup()) + if ev.eval_at_sub(): + at_a = do_subs(exp, ev.eval_at_sub()) + if at_b is not None and at_a is not None: + exp = sympy.Add(at_b, -1 * at_a, evaluate=False) + elif at_b is not None: + exp = at_b + elif at_a is not None: + exp = at_a + + return exp + + +def convert_exp(exp): + if hasattr(exp, 'exp'): + exp_nested = exp.exp() + else: + exp_nested = exp.exp_nofunc() + + if exp_nested: + base = convert_exp(exp_nested) + if isinstance(base, list): + raise LaTeXParsingError("Cannot raise derivative to power") + if exp.atom(): + exponent = convert_atom(exp.atom()) + elif exp.expr(): + exponent = convert_expr(exp.expr()) + return sympy.Pow(base, exponent, evaluate=False) + else: + if hasattr(exp, 'comp'): + return convert_comp(exp.comp()) + else: + return convert_comp(exp.comp_nofunc()) + + +def convert_comp(comp): + if comp.group(): + return convert_expr(comp.group().expr()) + elif comp.abs_group(): + return sympy.Abs(convert_expr(comp.abs_group().expr()), evaluate=False) + elif comp.atom(): + return convert_atom(comp.atom()) + elif comp.floor(): + return convert_floor(comp.floor()) + elif comp.ceil(): + return convert_ceil(comp.ceil()) + elif comp.func(): + return convert_func(comp.func()) + + +def convert_atom(atom): + if atom.LETTER(): + sname = atom.LETTER().getText() + if atom.subexpr(): + if atom.subexpr().expr(): # subscript is expr + subscript = convert_expr(atom.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(atom.subexpr().atom()) + sname += '_{' + StrPrinter().doprint(subscript) + '}' + if atom.SINGLE_QUOTES(): + sname += atom.SINGLE_QUOTES().getText() # put after subscript for easy identify + return sympy.Symbol(sname) + elif atom.SYMBOL(): + s = atom.SYMBOL().getText()[1:] + if s == "infty": + return sympy.oo + else: + if atom.subexpr(): + subscript = None + if atom.subexpr().expr(): # subscript is expr + subscript = convert_expr(atom.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(atom.subexpr().atom()) + subscriptName = StrPrinter().doprint(subscript) + s += '_{' + subscriptName + '}' + return sympy.Symbol(s) + elif atom.number(): + s = atom.number().getText().replace(",", "") + return sympy.Number(s) + elif atom.DIFFERENTIAL(): + var = get_differential_var(atom.DIFFERENTIAL()) + return sympy.Symbol('d' + var.name) + elif atom.mathit(): + text = rule2text(atom.mathit().mathit_text()) + return sympy.Symbol(text) + elif atom.frac(): + return convert_frac(atom.frac()) + elif atom.binom(): + return convert_binom(atom.binom()) + elif atom.bra(): + val = convert_expr(atom.bra().expr()) + return Bra(val) + elif atom.ket(): + val = convert_expr(atom.ket().expr()) + return Ket(val) + + +def rule2text(ctx): + stream = ctx.start.getInputStream() + # starting index of starting token + startIdx = ctx.start.start + # stopping index of stopping token + stopIdx = ctx.stop.stop + + return stream.getText(startIdx, stopIdx) + + +def convert_frac(frac): + diff_op = False + partial_op = False + if frac.lower and frac.upper: + lower_itv = frac.lower.getSourceInterval() + lower_itv_len = lower_itv[1] - lower_itv[0] + 1 + if (frac.lower.start == frac.lower.stop + and frac.lower.start.type == LaTeXLexer.DIFFERENTIAL): + wrt = get_differential_var_str(frac.lower.start.text) + diff_op = True + elif (lower_itv_len == 2 and frac.lower.start.type == LaTeXLexer.SYMBOL + and frac.lower.start.text == '\\partial' + and (frac.lower.stop.type == LaTeXLexer.LETTER + or frac.lower.stop.type == LaTeXLexer.SYMBOL)): + partial_op = True + wrt = frac.lower.stop.text + if frac.lower.stop.type == LaTeXLexer.SYMBOL: + wrt = wrt[1:] + + if diff_op or partial_op: + wrt = sympy.Symbol(wrt) + if (diff_op and frac.upper.start == frac.upper.stop + and frac.upper.start.type == LaTeXLexer.LETTER + and frac.upper.start.text == 'd'): + return [wrt] + elif (partial_op and frac.upper.start == frac.upper.stop + and frac.upper.start.type == LaTeXLexer.SYMBOL + and frac.upper.start.text == '\\partial'): + return [wrt] + upper_text = rule2text(frac.upper) + + expr_top = None + if diff_op and upper_text.startswith('d'): + expr_top = parse_latex(upper_text[1:]) + elif partial_op and frac.upper.start.text == '\\partial': + expr_top = parse_latex(upper_text[len('\\partial'):]) + if expr_top: + return sympy.Derivative(expr_top, wrt) + if frac.upper: + expr_top = convert_expr(frac.upper) + else: + expr_top = sympy.Number(frac.upperd.text) + if frac.lower: + expr_bot = convert_expr(frac.lower) + else: + expr_bot = sympy.Number(frac.lowerd.text) + inverse_denom = sympy.Pow(expr_bot, -1, evaluate=False) + if expr_top == 1: + return inverse_denom + else: + return sympy.Mul(expr_top, inverse_denom, evaluate=False) + +def convert_binom(binom): + expr_n = convert_expr(binom.n) + expr_k = convert_expr(binom.k) + return sympy.binomial(expr_n, expr_k, evaluate=False) + +def convert_floor(floor): + val = convert_expr(floor.val) + return sympy.floor(val, evaluate=False) + +def convert_ceil(ceil): + val = convert_expr(ceil.val) + return sympy.ceiling(val, evaluate=False) + +def convert_func(func): + if func.func_normal(): + if func.L_PAREN(): # function called with parenthesis + arg = convert_func_arg(func.func_arg()) + else: + arg = convert_func_arg(func.func_arg_noparens()) + + name = func.func_normal().start.text[1:] + + # change arc -> a + if name in [ + "arcsin", "arccos", "arctan", "arccsc", "arcsec", "arccot" + ]: + name = "a" + name[3:] + expr = getattr(sympy.functions, name)(arg, evaluate=False) + if name in ["arsinh", "arcosh", "artanh"]: + name = "a" + name[2:] + expr = getattr(sympy.functions, name)(arg, evaluate=False) + + if name == "exp": + expr = sympy.exp(arg, evaluate=False) + + if name in ("log", "lg", "ln"): + if func.subexpr(): + if func.subexpr().expr(): + base = convert_expr(func.subexpr().expr()) + else: + base = convert_atom(func.subexpr().atom()) + elif name == "lg": # ISO 80000-2:2019 + base = 10 + elif name in ("ln", "log"): # SymPy's latex printer prints ln as log by default + base = sympy.E + expr = sympy.log(arg, base, evaluate=False) + + func_pow = None + should_pow = True + if func.supexpr(): + if func.supexpr().expr(): + func_pow = convert_expr(func.supexpr().expr()) + else: + func_pow = convert_atom(func.supexpr().atom()) + + if name in [ + "sin", "cos", "tan", "csc", "sec", "cot", "sinh", "cosh", + "tanh" + ]: + if func_pow == -1: + name = "a" + name + should_pow = False + expr = getattr(sympy.functions, name)(arg, evaluate=False) + + if func_pow and should_pow: + expr = sympy.Pow(expr, func_pow, evaluate=False) + + return expr + elif func.LETTER() or func.SYMBOL(): + if func.LETTER(): + fname = func.LETTER().getText() + elif func.SYMBOL(): + fname = func.SYMBOL().getText()[1:] + fname = str(fname) # can't be unicode + if func.subexpr(): + if func.subexpr().expr(): # subscript is expr + subscript = convert_expr(func.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(func.subexpr().atom()) + subscriptName = StrPrinter().doprint(subscript) + fname += '_{' + subscriptName + '}' + if func.SINGLE_QUOTES(): + fname += func.SINGLE_QUOTES().getText() + input_args = func.args() + output_args = [] + while input_args.args(): # handle multiple arguments to function + output_args.append(convert_expr(input_args.expr())) + input_args = input_args.args() + output_args.append(convert_expr(input_args.expr())) + return sympy.Function(fname)(*output_args) + elif func.FUNC_INT(): + return handle_integral(func) + elif func.FUNC_SQRT(): + expr = convert_expr(func.base) + if func.root: + r = convert_expr(func.root) + return sympy.root(expr, r, evaluate=False) + else: + return sympy.sqrt(expr, evaluate=False) + elif func.FUNC_OVERLINE(): + expr = convert_expr(func.base) + return sympy.conjugate(expr, evaluate=False) + elif func.FUNC_SUM(): + return handle_sum_or_prod(func, "summation") + elif func.FUNC_PROD(): + return handle_sum_or_prod(func, "product") + elif func.FUNC_LIM(): + return handle_limit(func) + + +def convert_func_arg(arg): + if hasattr(arg, 'expr'): + return convert_expr(arg.expr()) + else: + return convert_mp(arg.mp_nofunc()) + + +def handle_integral(func): + if func.additive(): + integrand = convert_add(func.additive()) + elif func.frac(): + integrand = convert_frac(func.frac()) + else: + integrand = 1 + + int_var = None + if func.DIFFERENTIAL(): + int_var = get_differential_var(func.DIFFERENTIAL()) + else: + for sym in integrand.atoms(sympy.Symbol): + s = str(sym) + if len(s) > 1 and s[0] == 'd': + if s[1] == '\\': + int_var = sympy.Symbol(s[2:]) + else: + int_var = sympy.Symbol(s[1:]) + int_sym = sym + if int_var: + integrand = integrand.subs(int_sym, 1) + else: + # Assume dx by default + int_var = sympy.Symbol('x') + + if func.subexpr(): + if func.subexpr().atom(): + lower = convert_atom(func.subexpr().atom()) + else: + lower = convert_expr(func.subexpr().expr()) + if func.supexpr().atom(): + upper = convert_atom(func.supexpr().atom()) + else: + upper = convert_expr(func.supexpr().expr()) + return sympy.Integral(integrand, (int_var, lower, upper)) + else: + return sympy.Integral(integrand, int_var) + + +def handle_sum_or_prod(func, name): + val = convert_mp(func.mp()) + iter_var = convert_expr(func.subeq().equality().expr(0)) + start = convert_expr(func.subeq().equality().expr(1)) + if func.supexpr().expr(): # ^{expr} + end = convert_expr(func.supexpr().expr()) + else: # ^atom + end = convert_atom(func.supexpr().atom()) + + if name == "summation": + return sympy.Sum(val, (iter_var, start, end)) + elif name == "product": + return sympy.Product(val, (iter_var, start, end)) + + +def handle_limit(func): + sub = func.limit_sub() + if sub.LETTER(): + var = sympy.Symbol(sub.LETTER().getText()) + elif sub.SYMBOL(): + var = sympy.Symbol(sub.SYMBOL().getText()[1:]) + else: + var = sympy.Symbol('x') + if sub.SUB(): + direction = "-" + elif sub.ADD(): + direction = "+" + else: + direction = "+-" + approaching = convert_expr(sub.expr()) + content = convert_mp(func.mp()) + + return sympy.Limit(content, var, approaching, direction) + + +def get_differential_var(d): + text = get_differential_var_str(d.getText()) + return sympy.Symbol(text) + + +def get_differential_var_str(text): + for i in range(1, len(text)): + c = text[i] + if not (c == " " or c == "\r" or c == "\n" or c == "\t"): + idx = i + break + text = text[idx:] + if text[0] == "\\": + text = text[1:] + return text diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/errors.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/errors.py new file mode 100644 index 0000000000000000000000000000000000000000..d8c3ef9f06279df42d4b2054acc4cfe39b6682a5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/errors.py @@ -0,0 +1,2 @@ +class LaTeXParsingError(Exception): + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..92e58d3172e100cc376d0b416b3835d164bd5647 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py @@ -0,0 +1,2 @@ +from .latex_parser import parse_latex_lark, LarkLaTeXParser # noqa +from .transformer import TransformToSymPyExpr # noqa diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark new file mode 100644 index 0000000000000000000000000000000000000000..7439fab9dcac284dc3c9b5fbfa4fc6db8b29dfd2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark @@ -0,0 +1,28 @@ +// Greek symbols +// TODO: Shouold we include the uppercase variants for the symbols where the uppercase variant doesn't have a separate meaning? +ALPHA: "\\alpha" +BETA: "\\beta" +GAMMA: "\\gamma" +DELTA: "\\delta" // TODO: Should this be included? Delta usually denotes other things. +EPSILON: "\\epsilon" | "\\varepsilon" +ZETA: "\\zeta" +ETA: "\\eta" +THETA: "\\theta" | "\\vartheta" +// TODO: Should I add iota to the list? +KAPPA: "\\kappa" +LAMBDA: "\\lambda" // TODO: What about the uppercase variant? +MU: "\\mu" +NU: "\\nu" +XI: "\\xi" +// TODO: Should there be a separate note for transforming \pi into sympy.pi? +RHO: "\\rho" | "\\varrho" +// TODO: What should we do about sigma? +TAU: "\\tau" +UPSILON: "\\upsilon" +PHI: "\\phi" | "\\varphi" +CHI: "\\chi" +PSI: "\\psi" +OMEGA: "\\omega" + +GREEK_SYMBOL: ALPHA | BETA | GAMMA | DELTA | EPSILON | ZETA | ETA | THETA | KAPPA + | LAMBDA | MU | NU | XI | RHO | TAU | UPSILON | PHI | CHI | PSI | OMEGA diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark new file mode 100644 index 0000000000000000000000000000000000000000..43e8d0e9105fa4da9bcdd2c0fa6111f6d523c9a9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark @@ -0,0 +1,403 @@ +%ignore /[ \t\n\r]+/ + +%ignore "\\," | "\\thinspace" | "\\:" | "\\medspace" | "\\;" | "\\thickspace" +%ignore "\\quad" | "\\qquad" +%ignore "\\!" | "\\negthinspace" | "\\negmedspace" | "\\negthickspace" +%ignore "\\vrule" | "\\vcenter" | "\\vbox" | "\\vskip" | "\\vspace" | "\\hfill" +%ignore "\\*" | "\\-" | "\\." | "\\/" | "\\(" | "\\=" + +%ignore "\\left" | "\\right" +%ignore "\\limits" | "\\nolimits" +%ignore "\\displaystyle" + +///////////////////// tokens /////////////////////// + +// basic binary operators +ADD: "+" +SUB: "-" +MUL: "*" +DIV: "/" + +// tokens with distinct left and right symbols +L_BRACE: "{" +R_BRACE: "}" +L_BRACE_LITERAL: "\\{" +R_BRACE_LITERAL: "\\}" +L_BRACKET: "[" +R_BRACKET: "]" +L_CEIL: "\\lceil" +R_CEIL: "\\rceil" +L_FLOOR: "\\lfloor" +R_FLOOR: "\\rfloor" +L_PAREN: "(" +R_PAREN: ")" + +// limit, integral, sum, and product symbols +FUNC_LIM: "\\lim" +LIM_APPROACH_SYM: "\\to" | "\\rightarrow" | "\\Rightarrow" | "\\longrightarrow" | "\\Longrightarrow" +FUNC_INT: "\\int" | "\\intop" +FUNC_SUM: "\\sum" +FUNC_PROD: "\\prod" + +// common functions +FUNC_EXP: "\\exp" +FUNC_LOG: "\\log" +FUNC_LN: "\\ln" +FUNC_LG: "\\lg" +FUNC_MIN: "\\min" +FUNC_MAX: "\\max" + +// trigonometric functions +FUNC_SIN: "\\sin" +FUNC_COS: "\\cos" +FUNC_TAN: "\\tan" +FUNC_CSC: "\\csc" +FUNC_SEC: "\\sec" +FUNC_COT: "\\cot" + +// inverse trigonometric functions +FUNC_ARCSIN: "\\arcsin" +FUNC_ARCCOS: "\\arccos" +FUNC_ARCTAN: "\\arctan" +FUNC_ARCCSC: "\\arccsc" +FUNC_ARCSEC: "\\arcsec" +FUNC_ARCCOT: "\\arccot" + +// hyperbolic trigonometric functions +FUNC_SINH: "\\sinh" +FUNC_COSH: "\\cosh" +FUNC_TANH: "\\tanh" +FUNC_ARSINH: "\\arsinh" +FUNC_ARCOSH: "\\arcosh" +FUNC_ARTANH: "\\artanh" + +FUNC_SQRT: "\\sqrt" + +// miscellaneous symbols +CMD_TIMES: "\\times" +CMD_CDOT: "\\cdot" +CMD_DIV: "\\div" +CMD_FRAC: "\\frac" | "\\dfrac" | "\\tfrac" | "\\nicefrac" +CMD_BINOM: "\\binom" | "\\dbinom" | "\\tbinom" +CMD_OVERLINE: "\\overline" +CMD_LANGLE: "\\langle" +CMD_RANGLE: "\\rangle" + +CMD_MATHIT: "\\mathit" + +CMD_INFTY: "\\infty" + +BANG: "!" +BAR: "|" +CARET: "^" +COLON: ":" +UNDERSCORE: "_" + +// relational symbols +EQUAL: "=" +NOT_EQUAL: "\\neq" | "\\ne" +LT: "<" +LTE: "\\leq" | "\\le" | "\\leqslant" +GT: ">" +GTE: "\\geq" | "\\ge" | "\\geqslant" + +DIV_SYMBOL: CMD_DIV | DIV +MUL_SYMBOL: MUL | CMD_TIMES | CMD_CDOT + +%import .greek_symbols.GREEK_SYMBOL + +UPRIGHT_DIFFERENTIAL_SYMBOL: "\\text{d}" | "\\mathrm{d}" +DIFFERENTIAL_SYMBOL: "d" | UPRIGHT_DIFFERENTIAL_SYMBOL + +// disallow "d" as a variable name because we want to parse "d" as a differential symbol. +SYMBOL: /[a-zA-Z]'*/ +GREEK_SYMBOL_WITH_PRIMES: GREEK_SYMBOL "'"* +LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT: /([a-zA-Z]'*)_(([A-Za-z0-9]|[a-zA-Z]+)|\{([A-Za-z0-9]|[a-zA-Z]+'*)\})/ +LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT: /([a-zA-Z]'*)_/ GREEK_SYMBOL | /([a-zA-Z]'*)_/ L_BRACE GREEK_SYMBOL_WITH_PRIMES R_BRACE +// best to define the variant with braces like that instead of shoving it all into one case like in +// /([a-zA-Z])_/ L_BRACE? GREEK_SYMBOL R_BRACE? because then we can easily error out on input like +// r"h_{\theta" +GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT: GREEK_SYMBOL_WITH_PRIMES /_(([A-Za-z0-9]|[a-zA-Z]+)|\{([A-Za-z0-9]|[a-zA-Z]+'*)\})/ +GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT: GREEK_SYMBOL_WITH_PRIMES /_/ (GREEK_SYMBOL | L_BRACE GREEK_SYMBOL_WITH_PRIMES R_BRACE) +MULTI_LETTER_SYMBOL: /[a-zA-Z]+(\s+[a-zA-Z]+)*'*/ + +%import common.DIGIT -> DIGIT + +CMD_PRIME: "\\prime" +CMD_ASTERISK: "\\ast" + +PRIMES: "'"+ +STARS: "*"+ +PRIMES_VIA_CMD: CMD_PRIME+ +STARS_VIA_CMD: CMD_ASTERISK+ + +CMD_IMAGINARY_UNIT: "\\imaginaryunit" + +CMD_BEGIN: "\\begin" +CMD_END: "\\end" + +// matrices +IGNORE_L: /[ \t\n\r]*/ L_BRACE* /[ \t\n\r]*/ +IGNORE_R: /[ \t\n\r]*/ R_BRACE* /[ \t\n\r]*/ +ARRAY_MATRIX_BEGIN: L_BRACE "array" R_BRACE L_BRACE /[^}]*/ R_BRACE +ARRAY_MATRIX_END: L_BRACE "array" R_BRACE +AMSMATH_MATRIX: L_BRACE "matrix" R_BRACE +AMSMATH_PMATRIX: L_BRACE "pmatrix" R_BRACE +AMSMATH_BMATRIX: L_BRACE "bmatrix" R_BRACE +// Without the (L|R)_PARENs and (L|R)_BRACKETs, a matrix defined using +// \begin{array}...\end{array} or \begin{matrix}...\end{matrix} must +// not qualify as a complete matrix expression; this is done so that +// if we have \begin{array}...\end{array} or \begin{matrix}...\end{matrix} +// between BAR pairs, then they should be interpreted as determinants as +// opposed to sympy.Abs (absolute value) applied to a matrix. +CMD_BEGIN_AMSPMATRIX_AMSBMATRIX: CMD_BEGIN (AMSMATH_PMATRIX | AMSMATH_BMATRIX) +CMD_BEGIN_ARRAY_AMSMATRIX: (L_PAREN | L_BRACKET) IGNORE_L CMD_BEGIN (ARRAY_MATRIX_BEGIN | AMSMATH_MATRIX) +CMD_MATRIX_BEGIN: CMD_BEGIN_AMSPMATRIX_AMSBMATRIX | CMD_BEGIN_ARRAY_AMSMATRIX +CMD_END_AMSPMATRIX_AMSBMATRIX: CMD_END (AMSMATH_PMATRIX | AMSMATH_BMATRIX) +CMD_END_ARRAY_AMSMATRIX: CMD_END (ARRAY_MATRIX_END | AMSMATH_MATRIX) IGNORE_R "\\right"? (R_PAREN | R_BRACKET) +CMD_MATRIX_END: CMD_END_AMSPMATRIX_AMSBMATRIX | CMD_END_ARRAY_AMSMATRIX +MATRIX_COL_DELIM: "&" +MATRIX_ROW_DELIM: "\\\\" +FUNC_MATRIX_TRACE: "\\trace" +FUNC_MATRIX_ADJUGATE: "\\adjugate" + +// determinants +AMSMATH_VMATRIX: L_BRACE "vmatrix" R_BRACE +CMD_DETERMINANT_BEGIN_SIMPLE: CMD_BEGIN AMSMATH_VMATRIX +CMD_DETERMINANT_BEGIN_VARIANT: BAR IGNORE_L CMD_BEGIN (ARRAY_MATRIX_BEGIN | AMSMATH_MATRIX) +CMD_DETERMINANT_BEGIN: CMD_DETERMINANT_BEGIN_SIMPLE | CMD_DETERMINANT_BEGIN_VARIANT +CMD_DETERMINANT_END_SIMPLE: CMD_END AMSMATH_VMATRIX +CMD_DETERMINANT_END_VARIANT: CMD_END (ARRAY_MATRIX_END | AMSMATH_MATRIX) IGNORE_R "\\right"? BAR +CMD_DETERMINANT_END: CMD_DETERMINANT_END_SIMPLE | CMD_DETERMINANT_END_VARIANT +FUNC_DETERMINANT: "\\det" + +//////////////////// grammar ////////////////////// + +latex_string: _relation | _expression + +_one_letter_symbol: SYMBOL + | LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT + | LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT + | GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_PRIMES +// LuaTeX-generated outputs of \mathit{foo'} and \mathit{foo}' +// seem to be the same on the surface. We allow both styles. +multi_letter_symbol: CMD_MATHIT L_BRACE MULTI_LETTER_SYMBOL R_BRACE + | CMD_MATHIT L_BRACE MULTI_LETTER_SYMBOL R_BRACE /'+/ +number: /\d+(\.\d*)?/ | CMD_IMAGINARY_UNIT + +_atomic_expr: _one_letter_symbol + | multi_letter_symbol + | number + | CMD_INFTY + +group_round_parentheses: L_PAREN _expression R_PAREN +group_square_brackets: L_BRACKET _expression R_BRACKET +group_curly_parentheses: L_BRACE _expression R_BRACE + +_relation: eq | ne | lt | lte | gt | gte + +eq: _expression EQUAL _expression +ne: _expression NOT_EQUAL _expression +lt: _expression LT _expression +lte: _expression LTE _expression +gt: _expression GT _expression +gte: _expression GTE _expression + +_expression_core: _atomic_expr | group_curly_parentheses + +add: _expression ADD _expression_mul + | ADD _expression_mul +sub: _expression SUB _expression_mul + | SUB _expression_mul +mul: _expression_mul MUL_SYMBOL _expression_power +div: _expression_mul DIV_SYMBOL _expression_power + +adjacent_expressions: (_one_letter_symbol | number) _expression_mul + | group_round_parentheses (group_round_parentheses | _one_letter_symbol) + | _function _function + | fraction _expression_mul + +_expression_func: _expression_core + | group_round_parentheses + | fraction + | binomial + | _function + | _integral// | derivative + | limit + | matrix + +_expression_power: _expression_func | superscript | matrix_prime | symbol_prime + +_expression_mul: _expression_power + | mul | div | adjacent_expressions + | summation | product + +_expression: _expression_mul | add | sub + +_limit_dir: "+" | "-" | L_BRACE ("+" | "-") R_BRACE + +limit_dir_expr: _expression CARET _limit_dir + +group_curly_parentheses_lim: L_BRACE _expression LIM_APPROACH_SYM (limit_dir_expr | _expression) R_BRACE + +limit: FUNC_LIM UNDERSCORE group_curly_parentheses_lim _expression + +differential: DIFFERENTIAL_SYMBOL _one_letter_symbol + +//_derivative_operator: CMD_FRAC L_BRACE DIFFERENTIAL_SYMBOL R_BRACE L_BRACE differential R_BRACE + +//derivative: _derivative_operator _expression + +_integral: normal_integral | integral_with_special_fraction + +normal_integral: FUNC_INT _expression DIFFERENTIAL_SYMBOL _one_letter_symbol + | FUNC_INT (CARET _expression_core UNDERSCORE _expression_core)? _expression? DIFFERENTIAL_SYMBOL _one_letter_symbol + | FUNC_INT (UNDERSCORE _expression_core CARET _expression_core)? _expression? DIFFERENTIAL_SYMBOL _one_letter_symbol + +group_curly_parentheses_int: L_BRACE _expression? differential R_BRACE + +special_fraction: CMD_FRAC group_curly_parentheses_int group_curly_parentheses + +integral_with_special_fraction: FUNC_INT special_fraction + | FUNC_INT (CARET _expression_core UNDERSCORE _expression_core)? special_fraction + | FUNC_INT (UNDERSCORE _expression_core CARET _expression_core)? special_fraction + +group_curly_parentheses_special: UNDERSCORE L_BRACE _atomic_expr EQUAL _atomic_expr R_BRACE CARET _expression_core + | CARET _expression_core UNDERSCORE L_BRACE _atomic_expr EQUAL _atomic_expr R_BRACE + +summation: FUNC_SUM group_curly_parentheses_special _expression + | FUNC_SUM group_curly_parentheses_special _expression + +product: FUNC_PROD group_curly_parentheses_special _expression + | FUNC_PROD group_curly_parentheses_special _expression + +superscript: _expression_func CARET (_expression_power | CMD_PRIME | CMD_ASTERISK) + | _expression_func CARET L_BRACE (PRIMES | STARS | PRIMES_VIA_CMD | STARS_VIA_CMD) R_BRACE + +matrix_prime: (matrix | group_round_parentheses) PRIMES + +symbol_prime: (LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT + | LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT + | GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT) PRIMES + +fraction: _basic_fraction + | _simple_fraction + | _general_fraction + +_basic_fraction: CMD_FRAC DIGIT (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_simple_fraction: CMD_FRAC DIGIT group_curly_parentheses + | CMD_FRAC group_curly_parentheses (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_general_fraction: CMD_FRAC group_curly_parentheses group_curly_parentheses + +binomial: _basic_binomial + | _simple_binomial + | _general_binomial + +_basic_binomial: CMD_BINOM DIGIT (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_simple_binomial: CMD_BINOM DIGIT group_curly_parentheses + | CMD_BINOM group_curly_parentheses (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_general_binomial: CMD_BINOM group_curly_parentheses group_curly_parentheses + +list_of_expressions: _expression ("," _expression)* + +function_applied: _one_letter_symbol L_PAREN list_of_expressions R_PAREN + +min: FUNC_MIN L_PAREN list_of_expressions R_PAREN + +max: FUNC_MAX L_PAREN list_of_expressions R_PAREN + +bra: CMD_LANGLE _expression BAR + +ket: BAR _expression CMD_RANGLE + +inner_product: CMD_LANGLE _expression BAR _expression CMD_RANGLE + +_function: function_applied + | abs | floor | ceil + | _trigonometric_function | _inverse_trigonometric_function + | _trigonometric_function_power + | _hyperbolic_trigonometric_function | _inverse_hyperbolic_trigonometric_function + | exponential + | log + | square_root + | factorial + | conjugate + | max | min + | bra | ket | inner_product + | determinant + | trace + | adjugate + +exponential: FUNC_EXP _expression + +log: FUNC_LOG _expression + | FUNC_LN _expression + | FUNC_LG _expression + | FUNC_LOG UNDERSCORE (DIGIT | _one_letter_symbol) _expression + | FUNC_LOG UNDERSCORE group_curly_parentheses _expression + +square_root: FUNC_SQRT group_curly_parentheses + | FUNC_SQRT group_square_brackets group_curly_parentheses + +factorial: _expression_func BANG + +conjugate: CMD_OVERLINE group_curly_parentheses + | CMD_OVERLINE DIGIT + +_trigonometric_function: sin | cos | tan | csc | sec | cot + +sin: FUNC_SIN _expression +cos: FUNC_COS _expression +tan: FUNC_TAN _expression +csc: FUNC_CSC _expression +sec: FUNC_SEC _expression +cot: FUNC_COT _expression + +_trigonometric_function_power: sin_power | cos_power | tan_power | csc_power | sec_power | cot_power + +sin_power: FUNC_SIN CARET _expression_core _expression +cos_power: FUNC_COS CARET _expression_core _expression +tan_power: FUNC_TAN CARET _expression_core _expression +csc_power: FUNC_CSC CARET _expression_core _expression +sec_power: FUNC_SEC CARET _expression_core _expression +cot_power: FUNC_COT CARET _expression_core _expression + +_hyperbolic_trigonometric_function: sinh | cosh | tanh + +sinh: FUNC_SINH _expression +cosh: FUNC_COSH _expression +tanh: FUNC_TANH _expression + +_inverse_trigonometric_function: arcsin | arccos | arctan | arccsc | arcsec | arccot + +arcsin: FUNC_ARCSIN _expression +arccos: FUNC_ARCCOS _expression +arctan: FUNC_ARCTAN _expression +arccsc: FUNC_ARCCSC _expression +arcsec: FUNC_ARCSEC _expression +arccot: FUNC_ARCCOT _expression + +_inverse_hyperbolic_trigonometric_function: asinh | acosh | atanh + +asinh: FUNC_ARSINH _expression +acosh: FUNC_ARCOSH _expression +atanh: FUNC_ARTANH _expression + +abs: BAR _expression BAR +floor: L_FLOOR _expression R_FLOOR +ceil: L_CEIL _expression R_CEIL + +matrix: CMD_MATRIX_BEGIN matrix_body CMD_MATRIX_END +matrix_body: matrix_row (MATRIX_ROW_DELIM matrix_row)* (MATRIX_ROW_DELIM)? +matrix_row: _expression (MATRIX_COL_DELIM _expression)* +determinant: (CMD_DETERMINANT_BEGIN matrix_body CMD_DETERMINANT_END) + | FUNC_DETERMINANT _expression +trace: FUNC_MATRIX_TRACE _expression +adjugate: FUNC_MATRIX_ADJUGATE _expression diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..29f594b0de4bfd4648df1554d5863a37afff035f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py @@ -0,0 +1,145 @@ +import os +import logging +import re +from pathlib import Path + +from sympy.external import import_module +from sympy.parsing.latex.lark.transformer import TransformToSymPyExpr + +_lark = import_module("lark") + + +class LarkLaTeXParser: + r"""Class for converting input `\mathrm{\LaTeX}` strings into SymPy Expressions. + It holds all the necessary internal data for doing so, and exposes hooks for + customizing its behavior. + + Parameters + ========== + + print_debug_output : bool, optional + + If set to ``True``, prints debug output to the logger. Defaults to ``False``. + + transform : bool, optional + + If set to ``True``, the class runs the Transformer class on the parse tree + generated by running ``Lark.parse`` on the input string. Defaults to ``True``. + + Setting it to ``False`` can help with debugging the `\mathrm{\LaTeX}` grammar. + + grammar_file : str, optional + + The path to the grammar file that the parser should use. If set to ``None``, + it uses the default grammar, which is in ``grammar/latex.lark``, relative to + the ``sympy/parsing/latex/lark/`` directory. + + transformer : str, optional + + The name of the Transformer class to use. If set to ``None``, it uses the + default transformer class, which is :py:func:`TransformToSymPyExpr`. + + """ + def __init__(self, print_debug_output=False, transform=True, grammar_file=None, transformer=None): + grammar_dir_path = os.path.join(os.path.dirname(__file__), "grammar/") + + if grammar_file is None: + latex_grammar = Path(os.path.join(grammar_dir_path, "latex.lark")).read_text(encoding="utf-8") + else: + latex_grammar = Path(grammar_file).read_text(encoding="utf-8") + + self.parser = _lark.Lark( + latex_grammar, + source_path=grammar_dir_path, + parser="earley", + start="latex_string", + lexer="auto", + ambiguity="explicit", + propagate_positions=False, + maybe_placeholders=False, + keep_all_tokens=True) + + self.print_debug_output = print_debug_output + self.transform_expr = transform + + if transformer is None: + self.transformer = TransformToSymPyExpr() + else: + self.transformer = transformer() + + def doparse(self, s: str): + if self.print_debug_output: + _lark.logger.setLevel(logging.DEBUG) + + parse_tree = self.parser.parse(s) + + if not self.transform_expr: + # exit early and return the parse tree + _lark.logger.debug("expression = %s", s) + _lark.logger.debug(parse_tree) + _lark.logger.debug(parse_tree.pretty()) + return parse_tree + + if self.print_debug_output: + # print this stuff before attempting to run the transformer + _lark.logger.debug("expression = %s", s) + # print the `parse_tree` variable + _lark.logger.debug(parse_tree.pretty()) + + sympy_expression = self.transformer.transform(parse_tree) + + if self.print_debug_output: + _lark.logger.debug("SymPy expression = %s", sympy_expression) + + return sympy_expression + + +if _lark is not None: + _lark_latex_parser = LarkLaTeXParser() + + +def parse_latex_lark(s: str): + """ + Experimental LaTeX parser using Lark. + + This function is still under development and its API may change with the + next releases of SymPy. + """ + if _lark is None: + raise ImportError("Lark is probably not installed") + return _lark_latex_parser.doparse(s) + + +def _pretty_print_lark_trees(tree, indent=0, show_expr=True): + if isinstance(tree, _lark.Token): + return tree.value + + data = str(tree.data) + + is_expr = data.startswith("expression") + + if is_expr: + data = re.sub(r"^expression", "E", data) + + is_ambig = (data == "_ambig") + + if is_ambig: + new_indent = indent + 2 + else: + new_indent = indent + + output = "" + show_node = not is_expr or show_expr + + if show_node: + output += str(data) + "(" + + if is_ambig: + output += "\n" + "\n".join([" " * new_indent + _pretty_print_lark_trees(i, new_indent, show_expr) for i in tree.children]) + else: + output += ",".join([_pretty_print_lark_trees(i, new_indent, show_expr) for i in tree.children]) + + if show_node: + output += ")" + + return output diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py new file mode 100644 index 0000000000000000000000000000000000000000..cbd514b6517336207a57de6d28bcce25858071dc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py @@ -0,0 +1,730 @@ +import re + +import sympy +from sympy.external import import_module +from sympy.parsing.latex.errors import LaTeXParsingError + +lark = import_module("lark") + +if lark: + from lark import Transformer, Token, Tree # type: ignore +else: + class Transformer: # type: ignore + def transform(self, *args): + pass + + + class Token: # type: ignore + pass + + + class Tree: # type: ignore + pass + + +# noinspection PyPep8Naming,PyMethodMayBeStatic +class TransformToSymPyExpr(Transformer): + """Returns a SymPy expression that is generated by traversing the ``lark.Tree`` + passed to the ``.transform()`` function. + + Notes + ===== + + **This class is never supposed to be used directly.** + + In order to tweak the behavior of this class, it has to be subclassed and then after + the required modifications are made, the name of the new class should be passed to + the :py:class:`LarkLaTeXParser` class by using the ``transformer`` argument in the + constructor. + + Parameters + ========== + + visit_tokens : bool, optional + For information about what this option does, see `here + `_. + + Note that the option must be set to ``True`` for the default parser to work. + """ + + SYMBOL = sympy.Symbol + DIGIT = sympy.core.numbers.Integer + + def CMD_INFTY(self, tokens): + return sympy.oo + + def GREEK_SYMBOL_WITH_PRIMES(self, tokens): + # we omit the first character because it is a backslash. Also, if the variable name has "var" in it, + # like "varphi" or "varepsilon", we remove that too + variable_name = re.sub("var", "", tokens[1:]) + + return sympy.Symbol(variable_name) + + def LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + if sub.startswith("{"): + return sympy.Symbol("%s_{%s}" % (base, sub[1:-1])) + else: + return sympy.Symbol("%s_{%s}" % (base, sub)) + + def GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + greek_letter = re.sub("var", "", base[1:]) + + if sub.startswith("{"): + return sympy.Symbol("%s_{%s}" % (greek_letter, sub[1:-1])) + else: + return sympy.Symbol("%s_{%s}" % (greek_letter, sub)) + + def LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + if sub.startswith("{"): + greek_letter = sub[2:-1] + else: + greek_letter = sub[1:] + + greek_letter = re.sub("var", "", greek_letter) + return sympy.Symbol("%s_{%s}" % (base, greek_letter)) + + + def GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + greek_base = re.sub("var", "", base[1:]) + + if sub.startswith("{"): + greek_sub = sub[2:-1] + else: + greek_sub = sub[1:] + + greek_sub = re.sub("var", "", greek_sub) + return sympy.Symbol("%s_{%s}" % (greek_base, greek_sub)) + + def multi_letter_symbol(self, tokens): + if len(tokens) == 4: # no primes (single quotes) on symbol + return sympy.Symbol(tokens[2]) + if len(tokens) == 5: # there are primes on the symbol + return sympy.Symbol(tokens[2] + tokens[4]) + + def number(self, tokens): + if tokens[0].type == "CMD_IMAGINARY_UNIT": + return sympy.I + + if "." in tokens[0]: + return sympy.core.numbers.Float(tokens[0]) + else: + return sympy.core.numbers.Integer(tokens[0]) + + def latex_string(self, tokens): + return tokens[0] + + def group_round_parentheses(self, tokens): + return tokens[1] + + def group_square_brackets(self, tokens): + return tokens[1] + + def group_curly_parentheses(self, tokens): + return tokens[1] + + def eq(self, tokens): + return sympy.Eq(tokens[0], tokens[2]) + + def ne(self, tokens): + return sympy.Ne(tokens[0], tokens[2]) + + def lt(self, tokens): + return sympy.Lt(tokens[0], tokens[2]) + + def lte(self, tokens): + return sympy.Le(tokens[0], tokens[2]) + + def gt(self, tokens): + return sympy.Gt(tokens[0], tokens[2]) + + def gte(self, tokens): + return sympy.Ge(tokens[0], tokens[2]) + + def add(self, tokens): + if len(tokens) == 2: # +a + return tokens[1] + if len(tokens) == 3: # a + b + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatAdd(lh, rh) + + return sympy.Add(lh, rh) + + def sub(self, tokens): + if len(tokens) == 2: # -a + x = tokens[1] + + if self._obj_is_sympy_Matrix(x): + return sympy.MatMul(-1, x) + + return -x + if len(tokens) == 3: # a - b + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatAdd(lh, sympy.MatMul(-1, rh)) + + return sympy.Add(lh, -rh) + + def mul(self, tokens): + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatMul(lh, rh) + + return sympy.Mul(lh, rh) + + def div(self, tokens): + return self._handle_division(tokens[0], tokens[2]) + + def adjacent_expressions(self, tokens): + # Most of the time, if two expressions are next to each other, it means implicit multiplication, + # but not always + from sympy.physics.quantum import Bra, Ket + if isinstance(tokens[0], Ket) and isinstance(tokens[1], Bra): + from sympy.physics.quantum import OuterProduct + return OuterProduct(tokens[0], tokens[1]) + elif tokens[0] == sympy.Symbol("d"): + # If the leftmost token is a "d", then it is highly likely that this is a differential + return tokens[0], tokens[1] + elif isinstance(tokens[0], tuple): + # then we have a derivative + return sympy.Derivative(tokens[1], tokens[0][1]) + else: + return sympy.Mul(tokens[0], tokens[1]) + + def superscript(self, tokens): + def isprime(x): + return isinstance(x, Token) and x.type == "PRIMES" + + def iscmdprime(x): + return isinstance(x, Token) and (x.type == "PRIMES_VIA_CMD" + or x.type == "CMD_PRIME") + + def isstar(x): + return isinstance(x, Token) and x.type == "STARS" + + def iscmdstar(x): + return isinstance(x, Token) and (x.type == "STARS_VIA_CMD" + or x.type == "CMD_ASTERISK") + + base = tokens[0] + if len(tokens) == 3: # a^b OR a^\prime OR a^\ast + sup = tokens[2] + if len(tokens) == 5: + # a^{'}, a^{''}, ... OR + # a^{*}, a^{**}, ... OR + # a^{\prime}, a^{\prime\prime}, ... OR + # a^{\ast}, a^{\ast\ast}, ... + sup = tokens[3] + + if self._obj_is_sympy_Matrix(base): + if sup == sympy.Symbol("T"): + return sympy.Transpose(base) + if sup == sympy.Symbol("H"): + return sympy.adjoint(base) + if isprime(sup): + sup = sup.value + if len(sup) % 2 == 0: + return base + return sympy.Transpose(base) + if iscmdprime(sup): + sup = sup.value + if (len(sup)/len(r"\prime")) % 2 == 0: + return base + return sympy.Transpose(base) + if isstar(sup): + sup = sup.value + # need .doit() in order to be consistent with + # sympy.adjoint() which returns the evaluated adjoint + # of a matrix + if len(sup) % 2 == 0: + return base.doit() + return sympy.adjoint(base) + if iscmdstar(sup): + sup = sup.value + # need .doit() for same reason as above + if (len(sup)/len(r"\ast")) % 2 == 0: + return base.doit() + return sympy.adjoint(base) + + if isprime(sup) or iscmdprime(sup) or isstar(sup) or iscmdstar(sup): + raise LaTeXParsingError(f"{base} with superscript {sup} is not understood.") + + return sympy.Pow(base, sup) + + def matrix_prime(self, tokens): + base = tokens[0] + primes = tokens[1].value + + if not self._obj_is_sympy_Matrix(base): + raise LaTeXParsingError(f"({base}){primes} is not understood.") + + if len(primes) % 2 == 0: + return base + + return sympy.Transpose(base) + + def symbol_prime(self, tokens): + base = tokens[0] + primes = tokens[1].value + + return sympy.Symbol(f"{base.name}{primes}") + + def fraction(self, tokens): + numerator = tokens[1] + if isinstance(tokens[2], tuple): + # we only need the variable w.r.t. which we are differentiating + _, variable = tokens[2] + + # we will pass this information upwards + return "derivative", variable + else: + denominator = tokens[2] + return self._handle_division(numerator, denominator) + + def binomial(self, tokens): + return sympy.binomial(tokens[1], tokens[2]) + + def normal_integral(self, tokens): + underscore_index = None + caret_index = None + + if "_" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the lower bound of the integral + underscore_index = tokens.index("_") + + if "^" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the upper bound of the integral + caret_index = tokens.index("^") + + lower_bound = tokens[underscore_index + 1] if underscore_index else None + upper_bound = tokens[caret_index + 1] if caret_index else None + + differential_symbol = self._extract_differential_symbol(tokens) + + if differential_symbol is None: + raise LaTeXParsingError("Differential symbol was not found in the expression." + "Valid differential symbols are \"d\", \"\\text{d}, and \"\\mathrm{d}\".") + + # else we can assume that a differential symbol was found + differential_variable_index = tokens.index(differential_symbol) + 1 + differential_variable = tokens[differential_variable_index] + + # we can't simply do something like `if (lower_bound and not upper_bound) ...` because this would + # evaluate to `True` if the `lower_bound` is 0 and upper bound is non-zero + if lower_bound is not None and upper_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Lower bound for the integral was found, but upper bound was not found.") + + if upper_bound is not None and lower_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Upper bound for the integral was found, but lower bound was not found.") + + # check if any expression was given or not. If it wasn't, then set the integrand to 1. + if underscore_index is not None and underscore_index == differential_variable_index - 3: + # The Token at differential_variable_index - 2 should be the integrand. However, if going one more step + # backwards after that gives us the underscore, then that means that there _was_ no integrand. + # Example: \int^7_0 dx + integrand = 1 + elif caret_index is not None and caret_index == differential_variable_index - 3: + # The Token at differential_variable_index - 2 should be the integrand. However, if going one more step + # backwards after that gives us the caret, then that means that there _was_ no integrand. + # Example: \int_0^7 dx + integrand = 1 + elif differential_variable_index == 2: + # this means we have something like "\int dx", because the "\int" symbol will always be + # at index 0 in `tokens` + integrand = 1 + else: + # The Token at differential_variable_index - 1 is the differential symbol itself, so we need to go one + # more step before that. + integrand = tokens[differential_variable_index - 2] + + if lower_bound is not None: + # then we have a definite integral + + # we can assume that either both the lower and upper bounds are given, or + # neither of them are + return sympy.Integral(integrand, (differential_variable, lower_bound, upper_bound)) + else: + # we have an indefinite integral + return sympy.Integral(integrand, differential_variable) + + def group_curly_parentheses_int(self, tokens): + # return signature is a tuple consisting of the expression in the numerator, along with the variable of + # integration + if len(tokens) == 3: + return 1, tokens[1] + elif len(tokens) == 4: + return tokens[1], tokens[2] + # there are no other possibilities + + def special_fraction(self, tokens): + numerator, variable = tokens[1] + denominator = tokens[2] + + # We pass the integrand, along with information about the variable of integration, upw + return sympy.Mul(numerator, sympy.Pow(denominator, -1)), variable + + def integral_with_special_fraction(self, tokens): + underscore_index = None + caret_index = None + + if "_" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the lower bound of the integral + underscore_index = tokens.index("_") + + if "^" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the upper bound of the integral + caret_index = tokens.index("^") + + lower_bound = tokens[underscore_index + 1] if underscore_index else None + upper_bound = tokens[caret_index + 1] if caret_index else None + + # we can't simply do something like `if (lower_bound and not upper_bound) ...` because this would + # evaluate to `True` if the `lower_bound` is 0 and upper bound is non-zero + if lower_bound is not None and upper_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Lower bound for the integral was found, but upper bound was not found.") + + if upper_bound is not None and lower_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Upper bound for the integral was found, but lower bound was not found.") + + integrand, differential_variable = tokens[-1] + + if lower_bound is not None: + # then we have a definite integral + + # we can assume that either both the lower and upper bounds are given, or + # neither of them are + return sympy.Integral(integrand, (differential_variable, lower_bound, upper_bound)) + else: + # we have an indefinite integral + return sympy.Integral(integrand, differential_variable) + + def group_curly_parentheses_special(self, tokens): + underscore_index = tokens.index("_") + caret_index = tokens.index("^") + + # given the type of expressions we are parsing, we can assume that the lower limit + # will always use braces around its arguments. This is because we don't support + # converting unconstrained sums into SymPy expressions. + + # first we isolate the bottom limit + left_brace_index = tokens.index("{", underscore_index) + right_brace_index = tokens.index("}", underscore_index) + + bottom_limit = tokens[left_brace_index + 1: right_brace_index] + + # next, we isolate the upper limit + top_limit = tokens[caret_index + 1:] + + # the code below will be useful for supporting things like `\sum_{n = 0}^{n = 5} n^2` + # if "{" in top_limit: + # left_brace_index = tokens.index("{", caret_index) + # if left_brace_index != -1: + # # then there's a left brace in the string, and we need to find the closing right brace + # right_brace_index = tokens.index("}", caret_index) + # top_limit = tokens[left_brace_index + 1: right_brace_index] + + # print(f"top limit = {top_limit}") + + index_variable = bottom_limit[0] + lower_limit = bottom_limit[-1] + upper_limit = top_limit[0] # for now, the index will always be 0 + + # print(f"return value = ({index_variable}, {lower_limit}, {upper_limit})") + + return index_variable, lower_limit, upper_limit + + def summation(self, tokens): + return sympy.Sum(tokens[2], tokens[1]) + + def product(self, tokens): + return sympy.Product(tokens[2], tokens[1]) + + def limit_dir_expr(self, tokens): + caret_index = tokens.index("^") + + if "{" in tokens: + left_curly_brace_index = tokens.index("{", caret_index) + direction = tokens[left_curly_brace_index + 1] + else: + direction = tokens[caret_index + 1] + + if direction == "+": + return tokens[0], "+" + elif direction == "-": + return tokens[0], "-" + else: + return tokens[0], "+-" + + def group_curly_parentheses_lim(self, tokens): + limit_variable = tokens[1] + if isinstance(tokens[3], tuple): + destination, direction = tokens[3] + else: + destination = tokens[3] + direction = "+-" + + return limit_variable, destination, direction + + def limit(self, tokens): + limit_variable, destination, direction = tokens[2] + + return sympy.Limit(tokens[-1], limit_variable, destination, direction) + + def differential(self, tokens): + return tokens[1] + + def derivative(self, tokens): + return sympy.Derivative(tokens[-1], tokens[5]) + + def list_of_expressions(self, tokens): + if len(tokens) == 1: + # we return it verbatim because the function_applied node expects + # a list + return tokens + else: + def remove_tokens(args): + if isinstance(args, Token): + if args.type != "COMMA": + # An unexpected token was encountered + raise LaTeXParsingError("A comma token was expected, but some other token was encountered.") + return False + return True + + return filter(remove_tokens, tokens) + + def function_applied(self, tokens): + return sympy.Function(tokens[0])(*tokens[2]) + + def min(self, tokens): + return sympy.Min(*tokens[2]) + + def max(self, tokens): + return sympy.Max(*tokens[2]) + + def bra(self, tokens): + from sympy.physics.quantum import Bra + return Bra(tokens[1]) + + def ket(self, tokens): + from sympy.physics.quantum import Ket + return Ket(tokens[1]) + + def inner_product(self, tokens): + from sympy.physics.quantum import Bra, Ket, InnerProduct + return InnerProduct(Bra(tokens[1]), Ket(tokens[3])) + + def sin(self, tokens): + return sympy.sin(tokens[1]) + + def cos(self, tokens): + return sympy.cos(tokens[1]) + + def tan(self, tokens): + return sympy.tan(tokens[1]) + + def csc(self, tokens): + return sympy.csc(tokens[1]) + + def sec(self, tokens): + return sympy.sec(tokens[1]) + + def cot(self, tokens): + return sympy.cot(tokens[1]) + + def sin_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.asin(tokens[-1]) + else: + return sympy.Pow(sympy.sin(tokens[-1]), exponent) + + def cos_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acos(tokens[-1]) + else: + return sympy.Pow(sympy.cos(tokens[-1]), exponent) + + def tan_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.atan(tokens[-1]) + else: + return sympy.Pow(sympy.tan(tokens[-1]), exponent) + + def csc_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acsc(tokens[-1]) + else: + return sympy.Pow(sympy.csc(tokens[-1]), exponent) + + def sec_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.asec(tokens[-1]) + else: + return sympy.Pow(sympy.sec(tokens[-1]), exponent) + + def cot_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acot(tokens[-1]) + else: + return sympy.Pow(sympy.cot(tokens[-1]), exponent) + + def arcsin(self, tokens): + return sympy.asin(tokens[1]) + + def arccos(self, tokens): + return sympy.acos(tokens[1]) + + def arctan(self, tokens): + return sympy.atan(tokens[1]) + + def arccsc(self, tokens): + return sympy.acsc(tokens[1]) + + def arcsec(self, tokens): + return sympy.asec(tokens[1]) + + def arccot(self, tokens): + return sympy.acot(tokens[1]) + + def sinh(self, tokens): + return sympy.sinh(tokens[1]) + + def cosh(self, tokens): + return sympy.cosh(tokens[1]) + + def tanh(self, tokens): + return sympy.tanh(tokens[1]) + + def asinh(self, tokens): + return sympy.asinh(tokens[1]) + + def acosh(self, tokens): + return sympy.acosh(tokens[1]) + + def atanh(self, tokens): + return sympy.atanh(tokens[1]) + + def abs(self, tokens): + return sympy.Abs(tokens[1]) + + def floor(self, tokens): + return sympy.floor(tokens[1]) + + def ceil(self, tokens): + return sympy.ceiling(tokens[1]) + + def factorial(self, tokens): + return sympy.factorial(tokens[0]) + + def conjugate(self, tokens): + return sympy.conjugate(tokens[1]) + + def square_root(self, tokens): + if len(tokens) == 2: + # then there was no square bracket argument + return sympy.sqrt(tokens[1]) + elif len(tokens) == 3: + # then there _was_ a square bracket argument + return sympy.root(tokens[2], tokens[1]) + + def exponential(self, tokens): + return sympy.exp(tokens[1]) + + def log(self, tokens): + if tokens[0].type == "FUNC_LG": + # we don't need to check if there's an underscore or not because having one + # in this case would be meaningless + # TODO: ANTLR refers to ISO 80000-2:2019. should we keep base 10 or base 2? + return sympy.log(tokens[1], 10) + elif tokens[0].type == "FUNC_LN": + return sympy.log(tokens[1]) + elif tokens[0].type == "FUNC_LOG": + # we check if a base was specified or not + if "_" in tokens: + # then a base was specified + return sympy.log(tokens[3], tokens[2]) + else: + # a base was not specified + return sympy.log(tokens[1]) + + def _extract_differential_symbol(self, s: str): + differential_symbols = {"d", r"\text{d}", r"\mathrm{d}"} + + differential_symbol = next((symbol for symbol in differential_symbols if symbol in s), None) + + return differential_symbol + + def matrix(self, tokens): + def is_matrix_row(x): + return (isinstance(x, Tree) and x.data == "matrix_row") + + def is_not_col_delim(y): + return (not isinstance(y, Token) or y.type != "MATRIX_COL_DELIM") + + matrix_body = tokens[1].children + return sympy.Matrix([[y for y in x.children if is_not_col_delim(y)] + for x in matrix_body if is_matrix_row(x)]) + + def determinant(self, tokens): + if len(tokens) == 2: # \det A + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take determinant of non-matrix.") + + return tokens[1].det() + + if len(tokens) == 3: # | A | + return self.matrix(tokens).det() + + def trace(self, tokens): + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take trace of non-matrix.") + + return sympy.Trace(tokens[1]) + + def adjugate(self, tokens): + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take adjugate of non-matrix.") + + # need .doit() since MatAdd does not support .adjugate() method + return tokens[1].doit().adjugate() + + def _obj_is_sympy_Matrix(self, obj): + if hasattr(obj, "is_Matrix"): + return obj.is_Matrix + + return isinstance(obj, sympy.Matrix) + + def _handle_division(self, numerator, denominator): + if self._obj_is_sympy_Matrix(denominator): + raise LaTeXParsingError("Cannot divide by matrices like this since " + "it is not clear if left or right multiplication " + "by the inverse is intended. Try explicitly " + "multiplying by the inverse instead.") + + if self._obj_is_sympy_Matrix(numerator): + return sympy.MatMul(numerator, sympy.Pow(denominator, -1)) + + return sympy.Mul(numerator, sympy.Pow(denominator, -1)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/mathematica.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/mathematica.py new file mode 100644 index 0000000000000000000000000000000000000000..b5824a8c33ee402d03e6c5617eeeea21d4a457d1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/mathematica.py @@ -0,0 +1,1085 @@ +from __future__ import annotations +import re +import typing +from itertools import product +from typing import Any, Callable + +import sympy +from sympy import Mul, Add, Pow, Rational, log, exp, sqrt, cos, sin, tan, asin, acos, acot, asec, acsc, sinh, cosh, tanh, asinh, \ + acosh, atanh, acoth, asech, acsch, expand, im, flatten, polylog, cancel, expand_trig, sign, simplify, \ + UnevaluatedExpr, S, atan, atan2, Mod, Max, Min, rf, Ei, Si, Ci, airyai, airyaiprime, airybi, primepi, prime, \ + isprime, cot, sec, csc, csch, sech, coth, Function, I, pi, Tuple, GreaterThan, StrictGreaterThan, StrictLessThan, \ + LessThan, Equality, Or, And, Lambda, Integer, Dummy, symbols +from sympy.core.sympify import sympify, _sympify +from sympy.functions.special.bessel import airybiprime +from sympy.functions.special.error_functions import li +from sympy.utilities.exceptions import sympy_deprecation_warning + + +def mathematica(s, additional_translations=None): + sympy_deprecation_warning( + """The ``mathematica`` function for the Mathematica parser is now +deprecated. Use ``parse_mathematica`` instead. +The parameter ``additional_translation`` can be replaced by SymPy's +.replace( ) or .subs( ) methods on the output expression instead.""", + deprecated_since_version="1.11", + active_deprecations_target="mathematica-parser-new", + ) + parser = MathematicaParser(additional_translations) + return sympify(parser._parse_old(s)) + + +def parse_mathematica(s): + """ + Translate a string containing a Wolfram Mathematica expression to a SymPy + expression. + + If the translator is unable to find a suitable SymPy expression, the + ``FullForm`` of the Mathematica expression will be output, using SymPy + ``Function`` objects as nodes of the syntax tree. + + Examples + ======== + + >>> from sympy.parsing.mathematica import parse_mathematica + >>> parse_mathematica("Sin[x]^2 Tan[y]") + sin(x)**2*tan(y) + >>> e = parse_mathematica("F[7,5,3]") + >>> e + F(7, 5, 3) + >>> from sympy import Function, Max, Min + >>> e.replace(Function("F"), lambda *x: Max(*x)*Min(*x)) + 21 + + Both standard input form and Mathematica full form are supported: + + >>> parse_mathematica("x*(a + b)") + x*(a + b) + >>> parse_mathematica("Times[x, Plus[a, b]]") + x*(a + b) + + To get a matrix from Wolfram's code: + + >>> m = parse_mathematica("{{a, b}, {c, d}}") + >>> m + ((a, b), (c, d)) + >>> from sympy import Matrix + >>> Matrix(m) + Matrix([ + [a, b], + [c, d]]) + + If the translation into equivalent SymPy expressions fails, an SymPy + expression equivalent to Wolfram Mathematica's "FullForm" will be created: + + >>> parse_mathematica("x_.") + Optional(Pattern(x, Blank())) + >>> parse_mathematica("Plus @@ {x, y, z}") + Apply(Plus, (x, y, z)) + >>> parse_mathematica("f[x_, 3] := x^3 /; x > 0") + SetDelayed(f(Pattern(x, Blank()), 3), Condition(x**3, x > 0)) + """ + parser = MathematicaParser() + return parser.parse(s) + + +def _parse_Function(*args): + if len(args) == 1: + arg = args[0] + Slot = Function("Slot") + slots = arg.atoms(Slot) + numbers = [a.args[0] for a in slots] + number_of_arguments = max(numbers) + if isinstance(number_of_arguments, Integer): + variables = symbols(f"dummy0:{number_of_arguments}", cls=Dummy) + return Lambda(variables, arg.xreplace({Slot(i+1): v for i, v in enumerate(variables)})) + return Lambda((), arg) + elif len(args) == 2: + variables = args[0] + body = args[1] + return Lambda(variables, body) + else: + raise SyntaxError("Function node expects 1 or 2 arguments") + + +def _deco(cls): + cls._initialize_class() + return cls + + +@_deco +class MathematicaParser: + """ + An instance of this class converts a string of a Wolfram Mathematica + expression to a SymPy expression. + + The main parser acts internally in three stages: + + 1. tokenizer: tokenizes the Mathematica expression and adds the missing * + operators. Handled by ``_from_mathematica_to_tokens(...)`` + 2. full form list: sort the list of strings output by the tokenizer into a + syntax tree of nested lists and strings, equivalent to Mathematica's + ``FullForm`` expression output. This is handled by the function + ``_from_tokens_to_fullformlist(...)``. + 3. SymPy expression: the syntax tree expressed as full form list is visited + and the nodes with equivalent classes in SymPy are replaced. Unknown + syntax tree nodes are cast to SymPy ``Function`` objects. This is + handled by ``_from_fullformlist_to_sympy(...)``. + + """ + + # left: Mathematica, right: SymPy + CORRESPONDENCES = { + 'Sqrt[x]': 'sqrt(x)', + 'Rational[x,y]': 'Rational(x,y)', + 'Exp[x]': 'exp(x)', + 'Log[x]': 'log(x)', + 'Log[x,y]': 'log(y,x)', + 'Log2[x]': 'log(x,2)', + 'Log10[x]': 'log(x,10)', + 'Mod[x,y]': 'Mod(x,y)', + 'Max[*x]': 'Max(*x)', + 'Min[*x]': 'Min(*x)', + 'Pochhammer[x,y]':'rf(x,y)', + 'ArcTan[x,y]':'atan2(y,x)', + 'ExpIntegralEi[x]': 'Ei(x)', + 'SinIntegral[x]': 'Si(x)', + 'CosIntegral[x]': 'Ci(x)', + 'AiryAi[x]': 'airyai(x)', + 'AiryAiPrime[x]': 'airyaiprime(x)', + 'AiryBi[x]' :'airybi(x)', + 'AiryBiPrime[x]' :'airybiprime(x)', + 'LogIntegral[x]':' li(x)', + 'PrimePi[x]': 'primepi(x)', + 'Prime[x]': 'prime(x)', + 'PrimeQ[x]': 'isprime(x)' + } + + # trigonometric, e.t.c. + for arc, tri, h in product(('', 'Arc'), ( + 'Sin', 'Cos', 'Tan', 'Cot', 'Sec', 'Csc'), ('', 'h')): + fm = arc + tri + h + '[x]' + if arc: # arc func + fs = 'a' + tri.lower() + h + '(x)' + else: # non-arc func + fs = tri.lower() + h + '(x)' + CORRESPONDENCES.update({fm: fs}) + + REPLACEMENTS = { + ' ': '', + '^': '**', + '{': '[', + '}': ']', + } + + RULES = { + # a single whitespace to '*' + 'whitespace': ( + re.compile(r''' + (?:(?<=[a-zA-Z\d])|(?<=\d\.)) # a letter or a number + \s+ # any number of whitespaces + (?:(?=[a-zA-Z\d])|(?=\.\d)) # a letter or a number + ''', re.VERBOSE), + '*'), + + # add omitted '*' character + 'add*_1': ( + re.compile(r''' + (?:(?<=[])\d])|(?<=\d\.)) # ], ) or a number + # '' + (?=[(a-zA-Z]) # ( or a single letter + ''', re.VERBOSE), + '*'), + + # add omitted '*' character (variable letter preceding) + 'add*_2': ( + re.compile(r''' + (?<=[a-zA-Z]) # a letter + \( # ( as a character + (?=.) # any characters + ''', re.VERBOSE), + '*('), + + # convert 'Pi' to 'pi' + 'Pi': ( + re.compile(r''' + (?: + \A|(?<=[^a-zA-Z]) + ) + Pi # 'Pi' is 3.14159... in Mathematica + (?=[^a-zA-Z]) + ''', re.VERBOSE), + 'pi'), + } + + # Mathematica function name pattern + FM_PATTERN = re.compile(r''' + (?: + \A|(?<=[^a-zA-Z]) # at the top or a non-letter + ) + [A-Z][a-zA-Z\d]* # Function + (?=\[) # [ as a character + ''', re.VERBOSE) + + # list or matrix pattern (for future usage) + ARG_MTRX_PATTERN = re.compile(r''' + \{.*\} + ''', re.VERBOSE) + + # regex string for function argument pattern + ARGS_PATTERN_TEMPLATE = r''' + (?: + \A|(?<=[^a-zA-Z]) + ) + {arguments} # model argument like x, y,... + (?=[^a-zA-Z]) + ''' + + # will contain transformed CORRESPONDENCES dictionary + TRANSLATIONS: dict[tuple[str, int], dict[str, Any]] = {} + + # cache for a raw users' translation dictionary + cache_original: dict[tuple[str, int], dict[str, Any]] = {} + + # cache for a compiled users' translation dictionary + cache_compiled: dict[tuple[str, int], dict[str, Any]] = {} + + @classmethod + def _initialize_class(cls): + # get a transformed CORRESPONDENCES dictionary + d = cls._compile_dictionary(cls.CORRESPONDENCES) + cls.TRANSLATIONS.update(d) + + def __init__(self, additional_translations=None): + self.translations = {} + + # update with TRANSLATIONS (class constant) + self.translations.update(self.TRANSLATIONS) + + if additional_translations is None: + additional_translations = {} + + # check the latest added translations + if self.__class__.cache_original != additional_translations: + if not isinstance(additional_translations, dict): + raise ValueError('The argument must be dict type') + + # get a transformed additional_translations dictionary + d = self._compile_dictionary(additional_translations) + + # update cache + self.__class__.cache_original = additional_translations + self.__class__.cache_compiled = d + + # merge user's own translations + self.translations.update(self.__class__.cache_compiled) + + @classmethod + def _compile_dictionary(cls, dic): + # for return + d = {} + + for fm, fs in dic.items(): + # check function form + cls._check_input(fm) + cls._check_input(fs) + + # uncover '*' hiding behind a whitespace + fm = cls._apply_rules(fm, 'whitespace') + fs = cls._apply_rules(fs, 'whitespace') + + # remove whitespace(s) + fm = cls._replace(fm, ' ') + fs = cls._replace(fs, ' ') + + # search Mathematica function name + m = cls.FM_PATTERN.search(fm) + + # if no-hit + if m is None: + err = "'{f}' function form is invalid.".format(f=fm) + raise ValueError(err) + + # get Mathematica function name like 'Log' + fm_name = m.group() + + # get arguments of Mathematica function + args, end = cls._get_args(m) + + # function side check. (e.g.) '2*Func[x]' is invalid. + if m.start() != 0 or end != len(fm): + err = "'{f}' function form is invalid.".format(f=fm) + raise ValueError(err) + + # check the last argument's 1st character + if args[-1][0] == '*': + key_arg = '*' + else: + key_arg = len(args) + + key = (fm_name, key_arg) + + # convert '*x' to '\\*x' for regex + re_args = [x if x[0] != '*' else '\\' + x for x in args] + + # for regex. Example: (?:(x|y|z)) + xyz = '(?:(' + '|'.join(re_args) + '))' + + # string for regex compile + patStr = cls.ARGS_PATTERN_TEMPLATE.format(arguments=xyz) + + pat = re.compile(patStr, re.VERBOSE) + + # update dictionary + d[key] = {} + d[key]['fs'] = fs # SymPy function template + d[key]['args'] = args # args are ['x', 'y'] for example + d[key]['pat'] = pat + + return d + + def _convert_function(self, s): + '''Parse Mathematica function to SymPy one''' + + # compiled regex object + pat = self.FM_PATTERN + + scanned = '' # converted string + cur = 0 # position cursor + while True: + m = pat.search(s) + + if m is None: + # append the rest of string + scanned += s + break + + # get Mathematica function name + fm = m.group() + + # get arguments, and the end position of fm function + args, end = self._get_args(m) + + # the start position of fm function + bgn = m.start() + + # convert Mathematica function to SymPy one + s = self._convert_one_function(s, fm, args, bgn, end) + + # update cursor + cur = bgn + + # append converted part + scanned += s[:cur] + + # shrink s + s = s[cur:] + + return scanned + + def _convert_one_function(self, s, fm, args, bgn, end): + # no variable-length argument + if (fm, len(args)) in self.translations: + key = (fm, len(args)) + + # x, y,... model arguments + x_args = self.translations[key]['args'] + + # make CORRESPONDENCES between model arguments and actual ones + d = dict(zip(x_args, args)) + + # with variable-length argument + elif (fm, '*') in self.translations: + key = (fm, '*') + + # x, y,..*args (model arguments) + x_args = self.translations[key]['args'] + + # make CORRESPONDENCES between model arguments and actual ones + d = {} + for i, x in enumerate(x_args): + if x[0] == '*': + d[x] = ','.join(args[i:]) + break + d[x] = args[i] + + # out of self.translations + else: + err = "'{f}' is out of the whitelist.".format(f=fm) + raise ValueError(err) + + # template string of converted function + template = self.translations[key]['fs'] + + # regex pattern for x_args + pat = self.translations[key]['pat'] + + scanned = '' + cur = 0 + while True: + m = pat.search(template) + + if m is None: + scanned += template + break + + # get model argument + x = m.group() + + # get a start position of the model argument + xbgn = m.start() + + # add the corresponding actual argument + scanned += template[:xbgn] + d[x] + + # update cursor to the end of the model argument + cur = m.end() + + # shrink template + template = template[cur:] + + # update to swapped string + s = s[:bgn] + scanned + s[end:] + + return s + + @classmethod + def _get_args(cls, m): + '''Get arguments of a Mathematica function''' + + s = m.string # whole string + anc = m.end() + 1 # pointing the first letter of arguments + square, curly = [], [] # stack for brackets + args = [] + + # current cursor + cur = anc + for i, c in enumerate(s[anc:], anc): + # extract one argument + if c == ',' and (not square) and (not curly): + args.append(s[cur:i]) # add an argument + cur = i + 1 # move cursor + + # handle list or matrix (for future usage) + if c == '{': + curly.append(c) + elif c == '}': + curly.pop() + + # seek corresponding ']' with skipping irrevant ones + if c == '[': + square.append(c) + elif c == ']': + if square: + square.pop() + else: # empty stack + args.append(s[cur:i]) + break + + # the next position to ']' bracket (the function end) + func_end = i + 1 + + return args, func_end + + @classmethod + def _replace(cls, s, bef): + aft = cls.REPLACEMENTS[bef] + s = s.replace(bef, aft) + return s + + @classmethod + def _apply_rules(cls, s, bef): + pat, aft = cls.RULES[bef] + return pat.sub(aft, s) + + @classmethod + def _check_input(cls, s): + for bracket in (('[', ']'), ('{', '}'), ('(', ')')): + if s.count(bracket[0]) != s.count(bracket[1]): + err = "'{f}' function form is invalid.".format(f=s) + raise ValueError(err) + + if '{' in s: + err = "Currently list is not supported." + raise ValueError(err) + + def _parse_old(self, s): + # input check + self._check_input(s) + + # uncover '*' hiding behind a whitespace + s = self._apply_rules(s, 'whitespace') + + # remove whitespace(s) + s = self._replace(s, ' ') + + # add omitted '*' character + s = self._apply_rules(s, 'add*_1') + s = self._apply_rules(s, 'add*_2') + + # translate function + s = self._convert_function(s) + + # '^' to '**' + s = self._replace(s, '^') + + # 'Pi' to 'pi' + s = self._apply_rules(s, 'Pi') + + # '{', '}' to '[', ']', respectively +# s = cls._replace(s, '{') # currently list is not taken into account +# s = cls._replace(s, '}') + + return s + + def parse(self, s): + s2 = self._from_mathematica_to_tokens(s) + s3 = self._from_tokens_to_fullformlist(s2) + s4 = self._from_fullformlist_to_sympy(s3) + return s4 + + INFIX = "Infix" + PREFIX = "Prefix" + POSTFIX = "Postfix" + FLAT = "Flat" + RIGHT = "Right" + LEFT = "Left" + + _mathematica_op_precedence: list[tuple[str, str | None, dict[str, str | Callable]]] = [ + (POSTFIX, None, {";": lambda x: x + ["Null"] if isinstance(x, list) and x and x[0] == "CompoundExpression" else ["CompoundExpression", x, "Null"]}), + (INFIX, FLAT, {";": "CompoundExpression"}), + (INFIX, RIGHT, {"=": "Set", ":=": "SetDelayed", "+=": "AddTo", "-=": "SubtractFrom", "*=": "TimesBy", "/=": "DivideBy"}), + (INFIX, LEFT, {"//": lambda x, y: [x, y]}), + (POSTFIX, None, {"&": "Function"}), + (INFIX, LEFT, {"/.": "ReplaceAll"}), + (INFIX, RIGHT, {"->": "Rule", ":>": "RuleDelayed"}), + (INFIX, LEFT, {"/;": "Condition"}), + (INFIX, FLAT, {"|": "Alternatives"}), + (POSTFIX, None, {"..": "Repeated", "...": "RepeatedNull"}), + (INFIX, FLAT, {"||": "Or"}), + (INFIX, FLAT, {"&&": "And"}), + (PREFIX, None, {"!": "Not"}), + (INFIX, FLAT, {"===": "SameQ", "=!=": "UnsameQ"}), + (INFIX, FLAT, {"==": "Equal", "!=": "Unequal", "<=": "LessEqual", "<": "Less", ">=": "GreaterEqual", ">": "Greater"}), + (INFIX, None, {";;": "Span"}), + (INFIX, FLAT, {"+": "Plus", "-": "Plus"}), + (INFIX, FLAT, {"*": "Times", "/": "Times"}), + (INFIX, FLAT, {".": "Dot"}), + (PREFIX, None, {"-": lambda x: MathematicaParser._get_neg(x), + "+": lambda x: x}), + (INFIX, RIGHT, {"^": "Power"}), + (INFIX, RIGHT, {"@@": "Apply", "/@": "Map", "//@": "MapAll", "@@@": lambda x, y: ["Apply", x, y, ["List", "1"]]}), + (POSTFIX, None, {"'": "Derivative", "!": "Factorial", "!!": "Factorial2", "--": "Decrement"}), + (INFIX, None, {"[": lambda x, y: [x, *y], "[[": lambda x, y: ["Part", x, *y]}), + (PREFIX, None, {"{": lambda x: ["List", *x], "(": lambda x: x[0]}), + (INFIX, None, {"?": "PatternTest"}), + (POSTFIX, None, { + "_": lambda x: ["Pattern", x, ["Blank"]], + "_.": lambda x: ["Optional", ["Pattern", x, ["Blank"]]], + "__": lambda x: ["Pattern", x, ["BlankSequence"]], + "___": lambda x: ["Pattern", x, ["BlankNullSequence"]], + }), + (INFIX, None, {"_": lambda x, y: ["Pattern", x, ["Blank", y]]}), + (PREFIX, None, {"#": "Slot", "##": "SlotSequence"}), + ] + + _missing_arguments_default = { + "#": lambda: ["Slot", "1"], + "##": lambda: ["SlotSequence", "1"], + } + + _literal = r"[A-Za-z][A-Za-z0-9]*" + _number = r"(?:[0-9]+(?:\.[0-9]*)?|\.[0-9]+)" + + _enclosure_open = ["(", "[", "[[", "{"] + _enclosure_close = [")", "]", "]]", "}"] + + @classmethod + def _get_neg(cls, x): + return f"-{x}" if isinstance(x, str) and re.match(MathematicaParser._number, x) else ["Times", "-1", x] + + @classmethod + def _get_inv(cls, x): + return ["Power", x, "-1"] + + _regex_tokenizer = None + + def _get_tokenizer(self): + if self._regex_tokenizer is not None: + # Check if the regular expression has already been compiled: + return self._regex_tokenizer + tokens = [self._literal, self._number] + tokens_escape = self._enclosure_open[:] + self._enclosure_close[:] + for typ, strat, symdict in self._mathematica_op_precedence: + for k in symdict: + tokens_escape.append(k) + tokens_escape.sort(key=lambda x: -len(x)) + tokens.extend(map(re.escape, tokens_escape)) + tokens.append(",") + tokens.append("\n") + tokenizer = re.compile("(" + "|".join(tokens) + ")") + self._regex_tokenizer = tokenizer + return self._regex_tokenizer + + def _from_mathematica_to_tokens(self, code: str): + tokenizer = self._get_tokenizer() + + # Find strings: + code_splits: list[str | list] = [] + while True: + string_start = code.find("\"") + if string_start == -1: + if len(code) > 0: + code_splits.append(code) + break + match_end = re.search(r'(? 0: + code_splits.append(code[:string_start]) + code_splits.append(["_Str", code[string_start+1:string_end].replace('\\"', '"')]) + code = code[string_end+1:] + + # Remove comments: + for i, code_split in enumerate(code_splits): + if isinstance(code_split, list): + continue + while True: + pos_comment_start = code_split.find("(*") + if pos_comment_start == -1: + break + pos_comment_end = code_split.find("*)") + if pos_comment_end == -1 or pos_comment_end < pos_comment_start: + raise SyntaxError("mismatch in comment (* *) code") + code_split = code_split[:pos_comment_start] + code_split[pos_comment_end+2:] + code_splits[i] = code_split + + # Tokenize the input strings with a regular expression: + token_lists = [tokenizer.findall(i) if isinstance(i, str) and i.isascii() else [i] for i in code_splits] + tokens = [j for i in token_lists for j in i] + + # Remove newlines at the beginning + while tokens and tokens[0] == "\n": + tokens.pop(0) + # Remove newlines at the end + while tokens and tokens[-1] == "\n": + tokens.pop(-1) + + return tokens + + def _is_op(self, token: str | list) -> bool: + if isinstance(token, list): + return False + if re.match(self._literal, token): + return False + if re.match("-?" + self._number, token): + return False + return True + + def _is_valid_star1(self, token: str | list) -> bool: + if token in (")", "}"): + return True + return not self._is_op(token) + + def _is_valid_star2(self, token: str | list) -> bool: + if token in ("(", "{"): + return True + return not self._is_op(token) + + def _from_tokens_to_fullformlist(self, tokens: list): + stack: list[list] = [[]] + open_seq = [] + pointer: int = 0 + while pointer < len(tokens): + token = tokens[pointer] + if token in self._enclosure_open: + stack[-1].append(token) + open_seq.append(token) + stack.append([]) + elif token == ",": + if len(stack[-1]) == 0 and stack[-2][-1] == open_seq[-1]: + raise SyntaxError("%s cannot be followed by comma ," % open_seq[-1]) + stack[-1] = self._parse_after_braces(stack[-1]) + stack.append([]) + elif token in self._enclosure_close: + ind = self._enclosure_close.index(token) + if self._enclosure_open[ind] != open_seq[-1]: + unmatched_enclosure = SyntaxError("unmatched enclosure") + if token == "]]" and open_seq[-1] == "[": + if open_seq[-2] == "[": + # These two lines would be logically correct, but are + # unnecessary: + # token = "]" + # tokens[pointer] = "]" + tokens.insert(pointer+1, "]") + elif open_seq[-2] == "[[": + if tokens[pointer+1] == "]": + tokens[pointer+1] = "]]" + elif tokens[pointer+1] == "]]": + tokens[pointer+1] = "]]" + tokens.insert(pointer+2, "]") + else: + raise unmatched_enclosure + else: + raise unmatched_enclosure + if len(stack[-1]) == 0 and stack[-2][-1] == "(": + raise SyntaxError("( ) not valid syntax") + last_stack = self._parse_after_braces(stack[-1], True) + stack[-1] = last_stack + new_stack_element = [] + while stack[-1][-1] != open_seq[-1]: + new_stack_element.append(stack.pop()) + new_stack_element.reverse() + if open_seq[-1] == "(" and len(new_stack_element) != 1: + raise SyntaxError("( must be followed by one expression, %i detected" % len(new_stack_element)) + stack[-1].append(new_stack_element) + open_seq.pop(-1) + else: + stack[-1].append(token) + pointer += 1 + if len(stack) != 1: + raise RuntimeError("Stack should have only one element") + return self._parse_after_braces(stack[0]) + + def _util_remove_newlines(self, lines: list, tokens: list, inside_enclosure: bool): + pointer = 0 + size = len(tokens) + while pointer < size: + token = tokens[pointer] + if token == "\n": + if inside_enclosure: + # Ignore newlines inside enclosures + tokens.pop(pointer) + size -= 1 + continue + if pointer == 0: + tokens.pop(0) + size -= 1 + continue + if pointer > 1: + try: + prev_expr = self._parse_after_braces(tokens[:pointer], inside_enclosure) + except SyntaxError: + tokens.pop(pointer) + size -= 1 + continue + else: + prev_expr = tokens[0] + if len(prev_expr) > 0 and prev_expr[0] == "CompoundExpression": + lines.extend(prev_expr[1:]) + else: + lines.append(prev_expr) + for i in range(pointer): + tokens.pop(0) + size -= pointer + pointer = 0 + continue + pointer += 1 + + def _util_add_missing_asterisks(self, tokens: list): + size: int = len(tokens) + pointer: int = 0 + while pointer < size: + if (pointer > 0 and + self._is_valid_star1(tokens[pointer - 1]) and + self._is_valid_star2(tokens[pointer])): + # This is a trick to add missing * operators in the expression, + # `"*" in op_dict` makes sure the precedence level is the same as "*", + # while `not self._is_op( ... )` makes sure this and the previous + # expression are not operators. + if tokens[pointer] == "(": + # ( has already been processed by now, replace: + tokens[pointer] = "*" + tokens[pointer + 1] = tokens[pointer + 1][0] + else: + tokens.insert(pointer, "*") + pointer += 1 + size += 1 + pointer += 1 + + def _parse_after_braces(self, tokens: list, inside_enclosure: bool = False): + op_dict: dict + changed: bool = False + lines: list = [] + + self._util_remove_newlines(lines, tokens, inside_enclosure) + + for op_type, grouping_strat, op_dict in reversed(self._mathematica_op_precedence): + if "*" in op_dict: + self._util_add_missing_asterisks(tokens) + size: int = len(tokens) + pointer: int = 0 + while pointer < size: + token = tokens[pointer] + if isinstance(token, str) and token in op_dict: + op_name: str | Callable = op_dict[token] + node: list + first_index: int + if isinstance(op_name, str): + node = [op_name] + first_index = 1 + else: + node = [] + first_index = 0 + if token in ("+", "-") and op_type == self.PREFIX and pointer > 0 and not self._is_op(tokens[pointer - 1]): + # Make sure that PREFIX + - don't match expressions like a + b or a - b, + # the INFIX + - are supposed to match that expression: + pointer += 1 + continue + if op_type == self.INFIX: + if pointer == 0 or pointer == size - 1 or self._is_op(tokens[pointer - 1]) or self._is_op(tokens[pointer + 1]): + pointer += 1 + continue + changed = True + tokens[pointer] = node + if op_type == self.INFIX: + arg1 = tokens.pop(pointer-1) + arg2 = tokens.pop(pointer) + if token == "/": + arg2 = self._get_inv(arg2) + elif token == "-": + arg2 = self._get_neg(arg2) + pointer -= 1 + size -= 2 + node.append(arg1) + node_p = node + if grouping_strat == self.FLAT: + while pointer + 2 < size and self._check_op_compatible(tokens[pointer+1], token): + node_p.append(arg2) + other_op = tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + if other_op == "/": + arg2 = self._get_inv(arg2) + elif other_op == "-": + arg2 = self._get_neg(arg2) + size -= 2 + node_p.append(arg2) + elif grouping_strat == self.RIGHT: + while pointer + 2 < size and tokens[pointer+1] == token: + node_p.append([op_name, arg2]) + node_p = node_p[-1] + tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + size -= 2 + node_p.append(arg2) + elif grouping_strat == self.LEFT: + while pointer + 1 < size and tokens[pointer+1] == token: + if isinstance(op_name, str): + node_p[first_index] = [op_name, node_p[first_index], arg2] + else: + node_p[first_index] = op_name(node_p[first_index], arg2) + tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + size -= 2 + node_p.append(arg2) + else: + node.append(arg2) + elif op_type == self.PREFIX: + if grouping_strat is not None: + raise TypeError("'Prefix' op_type should not have a grouping strat") + if pointer == size - 1 or self._is_op(tokens[pointer + 1]): + tokens[pointer] = self._missing_arguments_default[token]() + else: + node.append(tokens.pop(pointer+1)) + size -= 1 + elif op_type == self.POSTFIX: + if grouping_strat is not None: + raise TypeError("'Prefix' op_type should not have a grouping strat") + if pointer == 0 or self._is_op(tokens[pointer - 1]): + tokens[pointer] = self._missing_arguments_default[token]() + else: + node.append(tokens.pop(pointer-1)) + pointer -= 1 + size -= 1 + if isinstance(op_name, Callable): # type: ignore + op_call: Callable = typing.cast(Callable, op_name) + new_node = op_call(*node) + node.clear() + if isinstance(new_node, list): + node.extend(new_node) + else: + tokens[pointer] = new_node + pointer += 1 + if len(tokens) > 1 or (len(lines) == 0 and len(tokens) == 0): + if changed: + # Trick to deal with cases in which an operator with lower + # precedence should be transformed before an operator of higher + # precedence. Such as in the case of `#&[x]` (that is + # equivalent to `Lambda(d_, d_)(x)` in SymPy). In this case the + # operator `&` has lower precedence than `[`, but needs to be + # evaluated first because otherwise `# (&[x])` is not a valid + # expression: + return self._parse_after_braces(tokens, inside_enclosure) + raise SyntaxError("unable to create a single AST for the expression") + if len(lines) > 0: + if tokens[0] and tokens[0][0] == "CompoundExpression": + tokens = tokens[0][1:] + compound_expression = ["CompoundExpression", *lines, *tokens] + return compound_expression + return tokens[0] + + def _check_op_compatible(self, op1: str, op2: str): + if op1 == op2: + return True + muldiv = {"*", "/"} + addsub = {"+", "-"} + if op1 in muldiv and op2 in muldiv: + return True + if op1 in addsub and op2 in addsub: + return True + return False + + def _from_fullform_to_fullformlist(self, wmexpr: str): + """ + Parses FullForm[Downvalues[]] generated by Mathematica + """ + out: list = [] + stack = [out] + generator = re.finditer(r'[\[\],]', wmexpr) + last_pos = 0 + for match in generator: + if match is None: + break + position = match.start() + last_expr = wmexpr[last_pos:position].replace(',', '').replace(']', '').replace('[', '').strip() + + if match.group() == ',': + if last_expr != '': + stack[-1].append(last_expr) + elif match.group() == ']': + if last_expr != '': + stack[-1].append(last_expr) + stack.pop() + elif match.group() == '[': + stack[-1].append([last_expr]) + stack.append(stack[-1][-1]) + last_pos = match.end() + return out[0] + + def _from_fullformlist_to_fullformsympy(self, pylist: list): + from sympy import Function, Symbol + + def converter(expr): + if isinstance(expr, list): + if len(expr) > 0: + head = expr[0] + args = [converter(arg) for arg in expr[1:]] + return Function(head)(*args) + else: + raise ValueError("Empty list of expressions") + elif isinstance(expr, str): + return Symbol(expr) + else: + return _sympify(expr) + + return converter(pylist) + + _node_conversions = { + "Times": Mul, + "Plus": Add, + "Power": Pow, + "Rational": Rational, + "Log": lambda *a: log(*reversed(a)), + "Log2": lambda x: log(x, 2), + "Log10": lambda x: log(x, 10), + "Exp": exp, + "Sqrt": sqrt, + + "Sin": sin, + "Cos": cos, + "Tan": tan, + "Cot": cot, + "Sec": sec, + "Csc": csc, + + "ArcSin": asin, + "ArcCos": acos, + "ArcTan": lambda *a: atan2(*reversed(a)) if len(a) == 2 else atan(*a), + "ArcCot": acot, + "ArcSec": asec, + "ArcCsc": acsc, + + "Sinh": sinh, + "Cosh": cosh, + "Tanh": tanh, + "Coth": coth, + "Sech": sech, + "Csch": csch, + + "ArcSinh": asinh, + "ArcCosh": acosh, + "ArcTanh": atanh, + "ArcCoth": acoth, + "ArcSech": asech, + "ArcCsch": acsch, + + "Expand": expand, + "Im": im, + "Re": sympy.re, + "Flatten": flatten, + "Polylog": polylog, + "Cancel": cancel, + # Gamma=gamma, + "TrigExpand": expand_trig, + "Sign": sign, + "Simplify": simplify, + "Defer": UnevaluatedExpr, + "Identity": S, + # Sum=Sum_doit, + # Module=With, + # Block=With, + "Null": lambda *a: S.Zero, + "Mod": Mod, + "Max": Max, + "Min": Min, + "Pochhammer": rf, + "ExpIntegralEi": Ei, + "SinIntegral": Si, + "CosIntegral": Ci, + "AiryAi": airyai, + "AiryAiPrime": airyaiprime, + "AiryBi": airybi, + "AiryBiPrime": airybiprime, + "LogIntegral": li, + "PrimePi": primepi, + "Prime": prime, + "PrimeQ": isprime, + + "List": Tuple, + "Greater": StrictGreaterThan, + "GreaterEqual": GreaterThan, + "Less": StrictLessThan, + "LessEqual": LessThan, + "Equal": Equality, + "Or": Or, + "And": And, + + "Function": _parse_Function, + } + + _atom_conversions = { + "I": I, + "Pi": pi, + } + + def _from_fullformlist_to_sympy(self, full_form_list): + + def recurse(expr): + if isinstance(expr, list): + if isinstance(expr[0], list): + head = recurse(expr[0]) + else: + head = self._node_conversions.get(expr[0], Function(expr[0])) + return head(*[recurse(arg) for arg in expr[1:]]) + else: + return self._atom_conversions.get(expr, sympify(expr)) + + return recurse(full_form_list) + + def _from_fullformsympy_to_sympy(self, mform): + + expr = mform + for mma_form, sympy_node in self._node_conversions.items(): + expr = expr.replace(Function(mma_form), sympy_node) + return expr diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/maxima.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/maxima.py new file mode 100644 index 0000000000000000000000000000000000000000..7a8ee5b17bb03a36e338803cb10f9ebf22763c2c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/maxima.py @@ -0,0 +1,71 @@ +import re +from sympy.concrete.products import product +from sympy.concrete.summations import Sum +from sympy.core.sympify import sympify +from sympy.functions.elementary.trigonometric import (cos, sin) + + +class MaximaHelpers: + def maxima_expand(expr): + return expr.expand() + + def maxima_float(expr): + return expr.evalf() + + def maxima_trigexpand(expr): + return expr.expand(trig=True) + + def maxima_sum(a1, a2, a3, a4): + return Sum(a1, (a2, a3, a4)).doit() + + def maxima_product(a1, a2, a3, a4): + return product(a1, (a2, a3, a4)) + + def maxima_csc(expr): + return 1/sin(expr) + + def maxima_sec(expr): + return 1/cos(expr) + +sub_dict = { + 'pi': re.compile(r'%pi'), + 'E': re.compile(r'%e'), + 'I': re.compile(r'%i'), + '**': re.compile(r'\^'), + 'oo': re.compile(r'\binf\b'), + '-oo': re.compile(r'\bminf\b'), + "'-'": re.compile(r'\bminus\b'), + 'maxima_expand': re.compile(r'\bexpand\b'), + 'maxima_float': re.compile(r'\bfloat\b'), + 'maxima_trigexpand': re.compile(r'\btrigexpand'), + 'maxima_sum': re.compile(r'\bsum\b'), + 'maxima_product': re.compile(r'\bproduct\b'), + 'cancel': re.compile(r'\bratsimp\b'), + 'maxima_csc': re.compile(r'\bcsc\b'), + 'maxima_sec': re.compile(r'\bsec\b') +} + +var_name = re.compile(r'^\s*(\w+)\s*:') + + +def parse_maxima(str, globals=None, name_dict={}): + str = str.strip() + str = str.rstrip('; ') + + for k, v in sub_dict.items(): + str = v.sub(k, str) + + assign_var = None + var_match = var_name.search(str) + if var_match: + assign_var = var_match.group(1) + str = str[var_match.end():].strip() + + dct = MaximaHelpers.__dict__.copy() + dct.update(name_dict) + obj = sympify(str, locals=dct) + + if assign_var and globals: + globals[assign_var] = obj + + return obj diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sym_expr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sym_expr.py new file mode 100644 index 0000000000000000000000000000000000000000..9dbd0e94eb51147b51825fcf15cbec5ae18bb1b6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sym_expr.py @@ -0,0 +1,279 @@ +from sympy.printing import pycode, ccode, fcode +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on + +lfortran = import_module('lfortran') +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +if lfortran: + from sympy.parsing.fortran.fortran_parser import src_to_sympy +if cin: + from sympy.parsing.c.c_parser import parse_c + +@doctest_depends_on(modules=['lfortran', 'clang.cindex']) +class SymPyExpression: # type: ignore + """Class to store and handle SymPy expressions + + This class will hold SymPy Expressions and handle the API for the + conversion to and from different languages. + + It works with the C and the Fortran Parser to generate SymPy expressions + which are stored here and which can be converted to multiple language's + source code. + + Notes + ===== + + The module and its API are currently under development and experimental + and can be changed during development. + + The Fortran parser does not support numeric assignments, so all the + variables have been Initialized to zero. + + The module also depends on external dependencies: + + - LFortran which is required to use the Fortran parser + - Clang which is required for the C parser + + Examples + ======== + + Example of parsing C code: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src = ''' + ... int a,b; + ... float c = 2, d =4; + ... ''' + >>> a = SymPyExpression(src, 'c') + >>> a.return_expr() + [Declaration(Variable(a, type=intc)), + Declaration(Variable(b, type=intc)), + Declaration(Variable(c, type=float32, value=2.0)), + Declaration(Variable(d, type=float32, value=4.0))] + + An example of variable definition: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src2, 'f') + >>> p.convert_to_c() + ['int a = 0', 'int b = 0', 'int c = 0', 'int d = 0', 'double p = 0.0', 'double q = 0.0', 'double r = 0.0', 'double s = 0.0'] + + An example of Assignment: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer :: a, b, c, d, e + ... d = a + b - c + ... e = b * d + c * e / a + ... ''' + >>> p = SymPyExpression(src3, 'f') + >>> p.convert_to_python() + ['a = 0', 'b = 0', 'c = 0', 'd = 0', 'e = 0', 'd = a + b - c', 'e = b*d + c*e/a'] + + An example of function definition: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src = ''' + ... integer function f(a,b) + ... integer, intent(in) :: a, b + ... integer :: r + ... end function + ... ''' + >>> a = SymPyExpression(src, 'f') + >>> a.convert_to_python() + ['def f(a, b):\\n f = 0\\n r = 0\\n return f'] + + """ + + def __init__(self, source_code = None, mode = None): + """Constructor for SymPyExpression class""" + super().__init__() + if not(mode or source_code): + self._expr = [] + elif mode: + if source_code: + if mode.lower() == 'f': + if lfortran: + self._expr = src_to_sympy(source_code) + else: + raise ImportError("LFortran is not installed, cannot parse Fortran code") + elif mode.lower() == 'c': + if cin: + self._expr = parse_c(source_code) + else: + raise ImportError("Clang is not installed, cannot parse C code") + else: + raise NotImplementedError( + 'Parser for specified language is not implemented' + ) + else: + raise ValueError('Source code not present') + else: + raise ValueError('Please specify a mode for conversion') + + def convert_to_expr(self, src_code, mode): + """Converts the given source code to SymPy Expressions + + Attributes + ========== + + src_code : String + the source code or filename of the source code that is to be + converted + + mode: String + the mode to determine which parser is to be used according to + the language of the source code + f or F for Fortran + c or C for C/C++ + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer function f(a,b) result(r) + ... integer, intent(in) :: a, b + ... integer :: x + ... r = a + b -x + ... end function + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src3, 'f') + >>> p.return_expr() + [FunctionDefinition(integer, name=f, parameters=(Variable(a), Variable(b)), body=CodeBlock( + Declaration(Variable(r, type=integer, value=0)), + Declaration(Variable(x, type=integer, value=0)), + Assignment(Variable(r), a + b - x), + Return(Variable(r)) + ))] + + + + + """ + if mode.lower() == 'f': + if lfortran: + self._expr = src_to_sympy(src_code) + else: + raise ImportError("LFortran is not installed, cannot parse Fortran code") + elif mode.lower() == 'c': + if cin: + self._expr = parse_c(src_code) + else: + raise ImportError("Clang is not installed, cannot parse C code") + else: + raise NotImplementedError( + "Parser for specified language has not been implemented" + ) + + def convert_to_python(self): + """Returns a list with Python code for the SymPy expressions + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression(src2, 'f') + >>> p.convert_to_python() + ['a = 0', 'b = 0', 'c = 0', 'd = 0', 'p = 0.0', 'q = 0.0', 'r = 0.0', 's = 0.0', 'c = a/b', 'd = c/a', 's = p/q', 'r = q/p'] + + """ + self._pycode = [] + for iter in self._expr: + self._pycode.append(pycode(iter)) + return self._pycode + + def convert_to_c(self): + """Returns a list with the c source code for the SymPy expressions + + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src2, 'f') + >>> p.convert_to_c() + ['int a = 0', 'int b = 0', 'int c = 0', 'int d = 0', 'double p = 0.0', 'double q = 0.0', 'double r = 0.0', 'double s = 0.0', 'c = a/b;', 'd = c/a;', 's = p/q;', 'r = q/p;'] + + """ + self._ccode = [] + for iter in self._expr: + self._ccode.append(ccode(iter)) + return self._ccode + + def convert_to_fortran(self): + """Returns a list with the fortran source code for the SymPy expressions + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression(src2, 'f') + >>> p.convert_to_fortran() + [' integer*4 a', ' integer*4 b', ' integer*4 c', ' integer*4 d', ' real*8 p', ' real*8 q', ' real*8 r', ' real*8 s', ' c = a/b', ' d = c/a', ' s = p/q', ' r = q/p'] + + """ + self._fcode = [] + for iter in self._expr: + self._fcode.append(fcode(iter)) + return self._fcode + + def return_expr(self): + """Returns the expression list + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer function f(a,b) + ... integer, intent(in) :: a, b + ... integer :: r + ... r = a+b + ... f = r + ... end function + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src3, 'f') + >>> p.return_expr() + [FunctionDefinition(integer, name=f, parameters=(Variable(a), Variable(b)), body=CodeBlock( + Declaration(Variable(f, type=integer, value=0)), + Declaration(Variable(r, type=integer, value=0)), + Assignment(Variable(f), Variable(r)), + Return(Variable(f)) + ))] + + """ + return self._expr diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9cfda9ce0f73ffa3773031c48b9e9c245f69fe0b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py @@ -0,0 +1,1270 @@ +"""Transform a string with Python-like source code into SymPy expression. """ +from __future__ import annotations +from tokenize import (generate_tokens, untokenize, TokenError, + NUMBER, STRING, NAME, OP, ENDMARKER, ERRORTOKEN, NEWLINE) + +from keyword import iskeyword + +import ast +import unicodedata +from io import StringIO +import builtins +import types +from typing import Any, Callable +from functools import reduce +from sympy.assumptions.ask import AssumptionKeys +from sympy.core.basic import Basic +from sympy.core import Symbol +from sympy.core.function import Function +from sympy.utilities.misc import func_name +from sympy.functions.elementary.miscellaneous import Max, Min + + +null = '' + +TOKEN = tuple[int, str] +DICT = dict[str, Any] +TRANS = Callable[[list[TOKEN], DICT, DICT], list[TOKEN]] + +def _token_splittable(token_name: str) -> bool: + """ + Predicate for whether a token name can be split into multiple tokens. + + A token is splittable if it does not contain an underscore character and + it is not the name of a Greek letter. This is used to implicitly convert + expressions like 'xyz' into 'x*y*z'. + """ + if '_' in token_name: + return False + try: + return not unicodedata.lookup('GREEK SMALL LETTER ' + token_name) + except KeyError: + return len(token_name) > 1 + + +def _token_callable(token: TOKEN, local_dict: DICT, global_dict: DICT, nextToken=None): + """ + Predicate for whether a token name represents a callable function. + + Essentially wraps ``callable``, but looks up the token name in the + locals and globals. + """ + func = local_dict.get(token[1]) + if not func: + func = global_dict.get(token[1]) + return callable(func) and not isinstance(func, Symbol) + + +def _add_factorial_tokens(name: str, result: list[TOKEN]) -> list[TOKEN]: + if result == [] or result[-1][1] == '(': + raise TokenError() + + beginning = [(NAME, name), (OP, '(')] + end = [(OP, ')')] + + diff = 0 + length = len(result) + + for index, token in enumerate(result[::-1]): + toknum, tokval = token + i = length - index - 1 + + if tokval == ')': + diff += 1 + elif tokval == '(': + diff -= 1 + + if diff == 0: + if i - 1 >= 0 and result[i - 1][0] == NAME: + return result[:i - 1] + beginning + result[i - 1:] + end + else: + return result[:i] + beginning + result[i:] + end + + return result + + +class ParenthesisGroup(list[TOKEN]): + """List of tokens representing an expression in parentheses.""" + pass + + +class AppliedFunction: + """ + A group of tokens representing a function and its arguments. + + `exponent` is for handling the shorthand sin^2, ln^2, etc. + """ + def __init__(self, function: TOKEN, args: ParenthesisGroup, exponent=None): + if exponent is None: + exponent = [] + self.function = function + self.args = args + self.exponent = exponent + self.items = ['function', 'args', 'exponent'] + + def expand(self) -> list[TOKEN]: + """Return a list of tokens representing the function""" + return [self.function, *self.args] + + def __getitem__(self, index): + return getattr(self, self.items[index]) + + def __repr__(self): + return "AppliedFunction(%s, %s, %s)" % (self.function, self.args, + self.exponent) + + +def _flatten(result: list[TOKEN | AppliedFunction]): + result2: list[TOKEN] = [] + for tok in result: + if isinstance(tok, AppliedFunction): + result2.extend(tok.expand()) + else: + result2.append(tok) + return result2 + + +def _group_parentheses(recursor: TRANS): + def _inner(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Group tokens between parentheses with ParenthesisGroup. + + Also processes those tokens recursively. + + """ + result: list[TOKEN | ParenthesisGroup] = [] + stacks: list[ParenthesisGroup] = [] + stacklevel = 0 + for token in tokens: + if token[0] == OP: + if token[1] == '(': + stacks.append(ParenthesisGroup([])) + stacklevel += 1 + elif token[1] == ')': + stacks[-1].append(token) + stack = stacks.pop() + + if len(stacks) > 0: + # We don't recurse here since the upper-level stack + # would reprocess these tokens + stacks[-1].extend(stack) + else: + # Recurse here to handle nested parentheses + # Strip off the outer parentheses to avoid an infinite loop + inner = stack[1:-1] + inner = recursor(inner, + local_dict, + global_dict) + parenGroup = [stack[0]] + inner + [stack[-1]] + result.append(ParenthesisGroup(parenGroup)) + stacklevel -= 1 + continue + if stacklevel: + stacks[-1].append(token) + else: + result.append(token) + if stacklevel: + raise TokenError("Mismatched parentheses") + return result + return _inner + + +def _apply_functions(tokens: list[TOKEN | ParenthesisGroup], local_dict: DICT, global_dict: DICT): + """Convert a NAME token + ParenthesisGroup into an AppliedFunction. + + Note that ParenthesisGroups, if not applied to any function, are + converted back into lists of tokens. + + """ + result: list[TOKEN | AppliedFunction] = [] + symbol = None + for tok in tokens: + if isinstance(tok, ParenthesisGroup): + if symbol and _token_callable(symbol, local_dict, global_dict): + result[-1] = AppliedFunction(symbol, tok) + symbol = None + else: + result.extend(tok) + elif tok[0] == NAME: + symbol = tok + result.append(tok) + else: + symbol = None + result.append(tok) + return result + + +def _implicit_multiplication(tokens: list[TOKEN | AppliedFunction], local_dict: DICT, global_dict: DICT): + """Implicitly adds '*' tokens. + + Cases: + + - Two AppliedFunctions next to each other ("sin(x)cos(x)") + + - AppliedFunction next to an open parenthesis ("sin x (cos x + 1)") + + - A close parenthesis next to an AppliedFunction ("(x+2)sin x")\ + + - A close parenthesis next to an open parenthesis ("(x+2)(x+3)") + + - AppliedFunction next to an implicitly applied function ("sin(x)cos x") + + """ + result: list[TOKEN | AppliedFunction] = [] + skip = False + for tok, nextTok in zip(tokens, tokens[1:]): + result.append(tok) + if skip: + skip = False + continue + if tok[0] == OP and tok[1] == '.' and nextTok[0] == NAME: + # Dotted name. Do not do implicit multiplication + skip = True + continue + if isinstance(tok, AppliedFunction): + if isinstance(nextTok, AppliedFunction): + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Applied function followed by an open parenthesis + if tok.function[1] == "Function": + tok.function = (tok.function[0], 'Symbol') + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Applied function followed by implicitly applied function + result.append((OP, '*')) + else: + if tok == (OP, ')'): + if isinstance(nextTok, AppliedFunction): + # Close parenthesis followed by an applied function + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Close parenthesis followed by an implicitly applied function + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Close parenthesis followed by an open parenthesis + result.append((OP, '*')) + elif tok[0] == NAME and not _token_callable(tok, local_dict, global_dict): + if isinstance(nextTok, AppliedFunction) or \ + (nextTok[0] == NAME and _token_callable(nextTok, local_dict, global_dict)): + # Constant followed by (implicitly applied) function + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Constant followed by parenthesis + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Constant followed by constant + result.append((OP, '*')) + if tokens: + result.append(tokens[-1]) + return result + + +def _implicit_application(tokens: list[TOKEN | AppliedFunction], local_dict: DICT, global_dict: DICT): + """Adds parentheses as needed after functions.""" + result: list[TOKEN | AppliedFunction] = [] + appendParen = 0 # number of closing parentheses to add + skip = 0 # number of tokens to delay before adding a ')' (to + # capture **, ^, etc.) + exponentSkip = False # skipping tokens before inserting parentheses to + # work with function exponentiation + for tok, nextTok in zip(tokens, tokens[1:]): + result.append(tok) + if (tok[0] == NAME and nextTok[0] not in [OP, ENDMARKER, NEWLINE]): + if _token_callable(tok, local_dict, global_dict, nextTok): # type: ignore + result.append((OP, '(')) + appendParen += 1 + # name followed by exponent - function exponentiation + elif (tok[0] == NAME and nextTok[0] == OP and nextTok[1] == '**'): + if _token_callable(tok, local_dict, global_dict): # type: ignore + exponentSkip = True + elif exponentSkip: + # if the last token added was an applied function (i.e. the + # power of the function exponent) OR a multiplication (as + # implicit multiplication would have added an extraneous + # multiplication) + if (isinstance(tok, AppliedFunction) + or (tok[0] == OP and tok[1] == '*')): + # don't add anything if the next token is a multiplication + # or if there's already a parenthesis (if parenthesis, still + # stop skipping tokens) + if not (nextTok[0] == OP and nextTok[1] == '*'): + if not(nextTok[0] == OP and nextTok[1] == '('): + result.append((OP, '(')) + appendParen += 1 + exponentSkip = False + elif appendParen: + if nextTok[0] == OP and nextTok[1] in ('^', '**', '*'): + skip = 1 + continue + if skip: + skip -= 1 + continue + result.append((OP, ')')) + appendParen -= 1 + + if tokens: + result.append(tokens[-1]) + + if appendParen: + result.extend([(OP, ')')] * appendParen) + return result + + +def function_exponentiation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Allows functions to be exponentiated, e.g. ``cos**2(x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, function_exponentiation) + >>> transformations = standard_transformations + (function_exponentiation,) + >>> parse_expr('sin**4(x)', transformations=transformations) + sin(x)**4 + """ + result: list[TOKEN] = [] + exponent: list[TOKEN] = [] + consuming_exponent = False + level = 0 + for tok, nextTok in zip(tokens, tokens[1:]): + if tok[0] == NAME and nextTok[0] == OP and nextTok[1] == '**': + if _token_callable(tok, local_dict, global_dict): + consuming_exponent = True + elif consuming_exponent: + if tok[0] == NAME and tok[1] == 'Function': + tok = (NAME, 'Symbol') + exponent.append(tok) + + # only want to stop after hitting ) + if tok[0] == nextTok[0] == OP and tok[1] == ')' and nextTok[1] == '(': + consuming_exponent = False + # if implicit multiplication was used, we may have )*( instead + if tok[0] == nextTok[0] == OP and tok[1] == '*' and nextTok[1] == '(': + consuming_exponent = False + del exponent[-1] + continue + elif exponent and not consuming_exponent: + if tok[0] == OP: + if tok[1] == '(': + level += 1 + elif tok[1] == ')': + level -= 1 + if level == 0: + result.append(tok) + result.extend(exponent) + exponent = [] + continue + result.append(tok) + if tokens: + result.append(tokens[-1]) + if exponent: + result.extend(exponent) + return result + + +def split_symbols_custom(predicate: Callable[[str], bool]): + """Creates a transformation that splits symbol names. + + ``predicate`` should return True if the symbol name is to be split. + + For instance, to retain the default behavior but avoid splitting certain + symbol names, a predicate like this would work: + + + >>> from sympy.parsing.sympy_parser import (parse_expr, _token_splittable, + ... standard_transformations, implicit_multiplication, + ... split_symbols_custom) + >>> def can_split(symbol): + ... if symbol not in ('list', 'of', 'unsplittable', 'names'): + ... return _token_splittable(symbol) + ... return False + ... + >>> transformation = split_symbols_custom(can_split) + >>> parse_expr('unsplittable', transformations=standard_transformations + + ... (transformation, implicit_multiplication)) + unsplittable + """ + def _split_symbols(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + result: list[TOKEN] = [] + split = False + split_previous=False + + for tok in tokens: + if split_previous: + # throw out closing parenthesis of Symbol that was split + split_previous=False + continue + split_previous=False + + if tok[0] == NAME and tok[1] in ['Symbol', 'Function']: + split = True + + elif split and tok[0] == NAME: + symbol = tok[1][1:-1] + + if predicate(symbol): + tok_type = result[-2][1] # Symbol or Function + del result[-2:] # Get rid of the call to Symbol + + i = 0 + while i < len(symbol): + char = symbol[i] + if char in local_dict or char in global_dict: + result.append((NAME, "%s" % char)) + elif char.isdigit(): + chars = [char] + for i in range(i + 1, len(symbol)): + if not symbol[i].isdigit(): + i -= 1 + break + chars.append(symbol[i]) + char = ''.join(chars) + result.extend([(NAME, 'Number'), (OP, '('), + (NAME, "'%s'" % char), (OP, ')')]) + else: + use = tok_type if i == len(symbol) else 'Symbol' + result.extend([(NAME, use), (OP, '('), + (NAME, "'%s'" % char), (OP, ')')]) + i += 1 + + # Set split_previous=True so will skip + # the closing parenthesis of the original Symbol + split = False + split_previous = True + continue + + else: + split = False + + result.append(tok) + + return result + + return _split_symbols + + +#: Splits symbol names for implicit multiplication. +#: +#: Intended to let expressions like ``xyz`` be parsed as ``x*y*z``. Does not +#: split Greek character names, so ``theta`` will *not* become +#: ``t*h*e*t*a``. Generally this should be used with +#: ``implicit_multiplication``. +split_symbols = split_symbols_custom(_token_splittable) + + +def implicit_multiplication(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Makes the multiplication operator optional in most cases. + + Use this before :func:`implicit_application`, otherwise expressions like + ``sin 2x`` will be parsed as ``x * sin(2)`` rather than ``sin(2*x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_multiplication) + >>> transformations = standard_transformations + (implicit_multiplication,) + >>> parse_expr('3 x y', transformations=transformations) + 3*x*y + """ + # These are interdependent steps, so we don't expose them separately + res1 = _group_parentheses(implicit_multiplication)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _implicit_multiplication(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +def implicit_application(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Makes parentheses optional in some cases for function calls. + + Use this after :func:`implicit_multiplication`, otherwise expressions + like ``sin 2x`` will be parsed as ``x * sin(2)`` rather than + ``sin(2*x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_application) + >>> transformations = standard_transformations + (implicit_application,) + >>> parse_expr('cot z + csc z', transformations=transformations) + cot(z) + csc(z) + """ + res1 = _group_parentheses(implicit_application)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _implicit_application(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +def implicit_multiplication_application(result: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Allows a slightly relaxed syntax. + + - Parentheses for single-argument method calls are optional. + + - Multiplication is implicit. + + - Symbol names can be split (i.e. spaces are not needed between + symbols). + + - Functions can be exponentiated. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_multiplication_application) + >>> parse_expr("10sin**2 x**2 + 3xyz + tan theta", + ... transformations=(standard_transformations + + ... (implicit_multiplication_application,))) + 3*x*y*z + 10*sin(x**2)**2 + tan(theta) + + """ + for step in (split_symbols, implicit_multiplication, + implicit_application, function_exponentiation): + result = step(result, local_dict, global_dict) + + return result + + +def auto_symbol(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Inserts calls to ``Symbol``/``Function`` for undefined variables.""" + result: list[TOKEN] = [] + prevTok = (-1, '') + + tokens.append((-1, '')) # so zip traverses all tokens + for tok, nextTok in zip(tokens, tokens[1:]): + tokNum, tokVal = tok + nextTokNum, nextTokVal = nextTok + if tokNum == NAME: + name = tokVal + + if (name in ['True', 'False', 'None'] + or iskeyword(name) + # Don't convert attribute access + or (prevTok[0] == OP and prevTok[1] == '.') + # Don't convert keyword arguments + or (prevTok[0] == OP and prevTok[1] in ('(', ',') + and nextTokNum == OP and nextTokVal == '=') + # the name has already been defined + or name in local_dict and local_dict[name] is not null): + result.append((NAME, name)) + continue + elif name in local_dict: + local_dict.setdefault(null, set()).add(name) + if nextTokVal == '(': + local_dict[name] = Function(name) + else: + local_dict[name] = Symbol(name) + result.append((NAME, name)) + continue + elif name in global_dict: + obj = global_dict[name] + if isinstance(obj, (AssumptionKeys, Basic, type)) or callable(obj): + result.append((NAME, name)) + continue + + result.extend([ + (NAME, 'Symbol' if nextTokVal != '(' else 'Function'), + (OP, '('), + (NAME, repr(str(name))), + (OP, ')'), + ]) + else: + result.append((tokNum, tokVal)) + + prevTok = (tokNum, tokVal) + + return result + + +def lambda_notation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Substitutes "lambda" with its SymPy equivalent Lambda(). + However, the conversion does not take place if only "lambda" + is passed because that is a syntax error. + + """ + result: list[TOKEN] = [] + flag = False + toknum, tokval = tokens[0] + tokLen = len(tokens) + + if toknum == NAME and tokval == 'lambda': + if tokLen == 2 or tokLen == 3 and tokens[1][0] == NEWLINE: + # In Python 3.6.7+, inputs without a newline get NEWLINE added to + # the tokens + result.extend(tokens) + elif tokLen > 2: + result.extend([ + (NAME, 'Lambda'), + (OP, '('), + (OP, '('), + (OP, ')'), + (OP, ')'), + ]) + for tokNum, tokVal in tokens[1:]: + if tokNum == OP and tokVal == ':': + tokVal = ',' + flag = True + if not flag and tokNum == OP and tokVal in ('*', '**'): + raise TokenError("Starred arguments in lambda not supported") + if flag: + result.insert(-1, (tokNum, tokVal)) + else: + result.insert(-2, (tokNum, tokVal)) + else: + result.extend(tokens) + + return result + + +def factorial_notation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Allows standard notation for factorial.""" + result: list[TOKEN] = [] + nfactorial = 0 + for toknum, tokval in tokens: + if toknum == OP and tokval == "!": + # In Python 3.12 "!" are OP instead of ERRORTOKEN + nfactorial += 1 + elif toknum == ERRORTOKEN: + op = tokval + if op == '!': + nfactorial += 1 + else: + nfactorial = 0 + result.append((OP, op)) + else: + if nfactorial == 1: + result = _add_factorial_tokens('factorial', result) + elif nfactorial == 2: + result = _add_factorial_tokens('factorial2', result) + elif nfactorial > 2: + raise TokenError + nfactorial = 0 + result.append((toknum, tokval)) + return result + + +def convert_xor(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Treats XOR, ``^``, as exponentiation, ``**``.""" + result: list[TOKEN] = [] + for toknum, tokval in tokens: + if toknum == OP: + if tokval == '^': + result.append((OP, '**')) + else: + result.append((toknum, tokval)) + else: + result.append((toknum, tokval)) + + return result + + +def repeated_decimals(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """ + Allows 0.2[1] notation to represent the repeated decimal 0.2111... (19/90) + + Run this before auto_number. + + """ + result: list[TOKEN] = [] + + def is_digit(s): + return all(i in '0123456789_' for i in s) + + # num will running match any DECIMAL [ INTEGER ] + num: list[TOKEN] = [] + for toknum, tokval in tokens: + if toknum == NUMBER: + if (not num and '.' in tokval and 'e' not in tokval.lower() and + 'j' not in tokval.lower()): + num.append((toknum, tokval)) + elif is_digit(tokval) and (len(num) == 2 or + len(num) == 3 and is_digit(num[-1][1])): + num.append((toknum, tokval)) + else: + num = [] + elif toknum == OP: + if tokval == '[' and len(num) == 1: + num.append((OP, tokval)) + elif tokval == ']' and len(num) >= 3: + num.append((OP, tokval)) + elif tokval == '.' and not num: + # handle .[1] + num.append((NUMBER, '0.')) + else: + num = [] + else: + num = [] + + result.append((toknum, tokval)) + + if num and num[-1][1] == ']': + # pre.post[repetend] = a + b/c + d/e where a = pre, b/c = post, + # and d/e = repetend + result = result[:-len(num)] + pre, post = num[0][1].split('.') + repetend = num[2][1] + if len(num) == 5: + repetend += num[3][1] + + pre = pre.replace('_', '') + post = post.replace('_', '') + repetend = repetend.replace('_', '') + + zeros = '0'*len(post) + post, repetends = [w.lstrip('0') for w in [post, repetend]] + # or else interpreted as octal + + a = pre or '0' + b, c = post or '0', '1' + zeros + d, e = repetends, ('9'*len(repetend)) + zeros + + seq = [ + (OP, '('), + (NAME, 'Integer'), + (OP, '('), + (NUMBER, a), + (OP, ')'), + (OP, '+'), + (NAME, 'Rational'), + (OP, '('), + (NUMBER, b), + (OP, ','), + (NUMBER, c), + (OP, ')'), + (OP, '+'), + (NAME, 'Rational'), + (OP, '('), + (NUMBER, d), + (OP, ','), + (NUMBER, e), + (OP, ')'), + (OP, ')'), + ] + result.extend(seq) + num = [] + + return result + + +def auto_number(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """ + Converts numeric literals to use SymPy equivalents. + + Complex numbers use ``I``, integer literals use ``Integer``, and float + literals use ``Float``. + + """ + result: list[TOKEN] = [] + + for toknum, tokval in tokens: + if toknum == NUMBER: + number = tokval + postfix = [] + + if number.endswith(('j', 'J')): + number = number[:-1] + postfix = [(OP, '*'), (NAME, 'I')] + + if '.' in number or (('e' in number or 'E' in number) and + not (number.startswith(('0x', '0X')))): + seq = [(NAME, 'Float'), (OP, '('), + (NUMBER, repr(str(number))), (OP, ')')] + else: + seq = [(NAME, 'Integer'), (OP, '('), ( + NUMBER, number), (OP, ')')] + + result.extend(seq + postfix) + else: + result.append((toknum, tokval)) + + return result + + +def rationalize(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Converts floats into ``Rational``. Run AFTER ``auto_number``.""" + result: list[TOKEN] = [] + passed_float = False + for toknum, tokval in tokens: + if toknum == NAME: + if tokval == 'Float': + passed_float = True + tokval = 'Rational' + result.append((toknum, tokval)) + elif passed_float == True and toknum == NUMBER: + passed_float = False + result.append((STRING, tokval)) + else: + result.append((toknum, tokval)) + + return result + + +def _transform_equals_sign(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Transforms the equals sign ``=`` to instances of Eq. + + This is a helper function for ``convert_equals_signs``. + Works with expressions containing one equals sign and no + nesting. Expressions like ``(1=2)=False`` will not work with this + and should be used with ``convert_equals_signs``. + + Examples: 1=2 to Eq(1,2) + 1*2=x to Eq(1*2, x) + + This does not deal with function arguments yet. + + """ + result: list[TOKEN] = [] + if (OP, "=") in tokens: + result.append((NAME, "Eq")) + result.append((OP, "(")) + for token in tokens: + if token == (OP, "="): + result.append((OP, ",")) + continue + result.append(token) + result.append((OP, ")")) + else: + result = tokens + return result + + +def convert_equals_signs(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """ Transforms all the equals signs ``=`` to instances of Eq. + + Parses the equals signs in the expression and replaces them with + appropriate Eq instances. Also works with nested equals signs. + + Does not yet play well with function arguments. + For example, the expression ``(x=y)`` is ambiguous and can be interpreted + as x being an argument to a function and ``convert_equals_signs`` will not + work for this. + + See also + ======== + convert_equality_operators + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, convert_equals_signs) + >>> parse_expr("1*2=x", transformations=( + ... standard_transformations + (convert_equals_signs,))) + Eq(2, x) + >>> parse_expr("(1*2=x)=False", transformations=( + ... standard_transformations + (convert_equals_signs,))) + Eq(Eq(2, x), False) + + """ + res1 = _group_parentheses(convert_equals_signs)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _transform_equals_sign(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +#: Standard transformations for :func:`parse_expr`. +#: Inserts calls to :class:`~.Symbol`, :class:`~.Integer`, and other SymPy +#: datatypes and allows the use of standard factorial notation (e.g. ``x!``). +standard_transformations: tuple[TRANS, ...] \ + = (lambda_notation, auto_symbol, repeated_decimals, auto_number, + factorial_notation) + + +def stringify_expr(s: str, local_dict: DICT, global_dict: DICT, + transformations: tuple[TRANS, ...]) -> str: + """ + Converts the string ``s`` to Python code, in ``local_dict`` + + Generally, ``parse_expr`` should be used. + """ + + tokens = [] + input_code = StringIO(s.strip()) + for toknum, tokval, _, _, _ in generate_tokens(input_code.readline): + tokens.append((toknum, tokval)) + + for transform in transformations: + tokens = transform(tokens, local_dict, global_dict) + + return untokenize(tokens) + + +def eval_expr(code, local_dict: DICT, global_dict: DICT): + """ + Evaluate Python code generated by ``stringify_expr``. + + Generally, ``parse_expr`` should be used. + """ + expr = eval( + code, global_dict, local_dict) # take local objects in preference + return expr + + +def parse_expr(s: str, local_dict: DICT | None = None, + transformations: tuple[TRANS, ...] | str \ + = standard_transformations, + global_dict: DICT | None = None, evaluate=True): + """Converts the string ``s`` to a SymPy expression, in ``local_dict``. + + .. warning:: + Note that this function uses ``eval``, and thus shouldn't be used on + unsanitized input. + + Parameters + ========== + + s : str + The string to parse. + + local_dict : dict, optional + A dictionary of local variables to use when parsing. + + global_dict : dict, optional + A dictionary of global variables. By default, this is initialized + with ``from sympy import *``; provide this parameter to override + this behavior (for instance, to parse ``"Q & S"``). + + transformations : tuple or str + A tuple of transformation functions used to modify the tokens of the + parsed expression before evaluation. The default transformations + convert numeric literals into their SymPy equivalents, convert + undefined variables into SymPy symbols, and allow the use of standard + mathematical factorial notation (e.g. ``x!``). Selection via + string is available (see below). + + evaluate : bool, optional + When False, the order of the arguments will remain as they were in the + string and automatic simplification that would normally occur is + suppressed. (see examples) + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import parse_expr + >>> parse_expr("1/2") + 1/2 + >>> type(_) + + >>> from sympy.parsing.sympy_parser import standard_transformations,\\ + ... implicit_multiplication_application + >>> transformations = (standard_transformations + + ... (implicit_multiplication_application,)) + >>> parse_expr("2x", transformations=transformations) + 2*x + + When evaluate=False, some automatic simplifications will not occur: + + >>> parse_expr("2**3"), parse_expr("2**3", evaluate=False) + (8, 2**3) + + In addition the order of the arguments will not be made canonical. + This feature allows one to tell exactly how the expression was entered: + + >>> a = parse_expr('1 + x', evaluate=False) + >>> b = parse_expr('x + 1', evaluate=False) + >>> a == b + False + >>> a.args + (1, x) + >>> b.args + (x, 1) + + Note, however, that when these expressions are printed they will + appear the same: + + >>> assert str(a) == str(b) + + As a convenience, transformations can be seen by printing ``transformations``: + + >>> from sympy.parsing.sympy_parser import transformations + + >>> print(transformations) + 0: lambda_notation + 1: auto_symbol + 2: repeated_decimals + 3: auto_number + 4: factorial_notation + 5: implicit_multiplication_application + 6: convert_xor + 7: implicit_application + 8: implicit_multiplication + 9: convert_equals_signs + 10: function_exponentiation + 11: rationalize + + The ``T`` object provides a way to select these transformations: + + >>> from sympy.parsing.sympy_parser import T + + If you print it, you will see the same list as shown above. + + >>> str(T) == str(transformations) + True + + Standard slicing will return a tuple of transformations: + + >>> T[:5] == standard_transformations + True + + So ``T`` can be used to specify the parsing transformations: + + >>> parse_expr("2x", transformations=T[:5]) + Traceback (most recent call last): + ... + SyntaxError: invalid syntax + >>> parse_expr("2x", transformations=T[:6]) + 2*x + >>> parse_expr('.3', transformations=T[3, 11]) + 3/10 + >>> parse_expr('.3x', transformations=T[:]) + 3*x/10 + + As a further convenience, strings 'implicit' and 'all' can be used + to select 0-5 and all the transformations, respectively. + + >>> parse_expr('.3x', transformations='all') + 3*x/10 + + See Also + ======== + + stringify_expr, eval_expr, standard_transformations, + implicit_multiplication_application + + """ + + if local_dict is None: + local_dict = {} + elif not isinstance(local_dict, dict): + raise TypeError('expecting local_dict to be a dict') + elif null in local_dict: + raise ValueError('cannot use "" in local_dict') + + if global_dict is None: + global_dict = {} + exec('from sympy import *', global_dict) + + builtins_dict = vars(builtins) + for name, obj in builtins_dict.items(): + if isinstance(obj, types.BuiltinFunctionType): + global_dict[name] = obj + global_dict['max'] = Max + global_dict['min'] = Min + + elif not isinstance(global_dict, dict): + raise TypeError('expecting global_dict to be a dict') + + transformations = transformations or () + if isinstance(transformations, str): + if transformations == 'all': + _transformations = T[:] + elif transformations == 'implicit': + _transformations = T[:6] + else: + raise ValueError('unknown transformation group name') + else: + _transformations = transformations + + code = stringify_expr(s, local_dict, global_dict, _transformations) + + if not evaluate: + code = compile(evaluateFalse(code), '', 'eval') # type: ignore + + try: + rv = eval_expr(code, local_dict, global_dict) + # restore neutral definitions for names + for i in local_dict.pop(null, ()): + local_dict[i] = null + return rv + except Exception as e: + # restore neutral definitions for names + for i in local_dict.pop(null, ()): + local_dict[i] = null + raise e from ValueError(f"Error from parse_expr with transformed code: {code!r}") + + +def evaluateFalse(s: str): + """ + Replaces operators with the SymPy equivalent and sets evaluate=False. + """ + node = ast.parse(s) + transformed_node = EvaluateFalseTransformer().visit(node) + # node is a Module, we want an Expression + transformed_node = ast.Expression(transformed_node.body[0].value) + + return ast.fix_missing_locations(transformed_node) + + +class EvaluateFalseTransformer(ast.NodeTransformer): + operators = { + ast.Add: 'Add', + ast.Mult: 'Mul', + ast.Pow: 'Pow', + ast.Sub: 'Add', + ast.Div: 'Mul', + ast.BitOr: 'Or', + ast.BitAnd: 'And', + ast.BitXor: 'Not', + } + functions = ( + 'Abs', 'im', 're', 'sign', 'arg', 'conjugate', + 'acos', 'acot', 'acsc', 'asec', 'asin', 'atan', + 'acosh', 'acoth', 'acsch', 'asech', 'asinh', 'atanh', + 'cos', 'cot', 'csc', 'sec', 'sin', 'tan', + 'cosh', 'coth', 'csch', 'sech', 'sinh', 'tanh', + 'exp', 'ln', 'log', 'sqrt', 'cbrt', + ) + + relational_operators = { + ast.NotEq: 'Ne', + ast.Lt: 'Lt', + ast.LtE: 'Le', + ast.Gt: 'Gt', + ast.GtE: 'Ge', + ast.Eq: 'Eq' + } + def visit_Compare(self, node): + def reducer(acc, op_right): + result, left = acc + op, right = op_right + if op.__class__ not in self.relational_operators: + raise ValueError("Only equation or inequality operators are supported") + new = ast.Call( + func=ast.Name( + id=self.relational_operators[op.__class__], ctx=ast.Load() + ), + args=[self.visit(left), self.visit(right)], + keywords=[ast.keyword(arg="evaluate", value=ast.Constant(value=False))], + ) + return result + [new], right + + args, _ = reduce( + reducer, zip(node.ops, node.comparators), ([], node.left) + ) + if len(args) == 1: + return args[0] + return ast.Call( + func=ast.Name(id=self.operators[ast.BitAnd], ctx=ast.Load()), + args=args, + keywords=[ast.keyword(arg="evaluate", value=ast.Constant(value=False))], + ) + + def flatten(self, args, func): + result = [] + for arg in args: + if isinstance(arg, ast.Call): + arg_func = arg.func + if isinstance(arg_func, ast.Call): + arg_func = arg_func.func + if arg_func.id == func: + result.extend(self.flatten(arg.args, func)) + else: + result.append(arg) + else: + result.append(arg) + return result + + def visit_BinOp(self, node): + if node.op.__class__ in self.operators: + sympy_class = self.operators[node.op.__class__] + right = self.visit(node.right) + left = self.visit(node.left) + + rev = False + if isinstance(node.op, ast.Sub): + right = ast.Call( + func=ast.Name(id='Mul', ctx=ast.Load()), + args=[ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1)), right], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + elif isinstance(node.op, ast.Div): + if isinstance(node.left, ast.UnaryOp): + left, right = right, left + rev = True + left = ast.Call( + func=ast.Name(id='Pow', ctx=ast.Load()), + args=[left, ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1))], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + else: + right = ast.Call( + func=ast.Name(id='Pow', ctx=ast.Load()), + args=[right, ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1))], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + + if rev: # undo reversal + left, right = right, left + new_node = ast.Call( + func=ast.Name(id=sympy_class, ctx=ast.Load()), + args=[left, right], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + + if sympy_class in ('Add', 'Mul'): + # Denest Add or Mul as appropriate + new_node.args = self.flatten(new_node.args, sympy_class) + + return new_node + return node + + def visit_Call(self, node): + new_node = self.generic_visit(node) + if isinstance(node.func, ast.Name) and node.func.id in self.functions: + new_node.keywords.append(ast.keyword(arg='evaluate', value=ast.Constant(value=False))) + return new_node + + +_transformation = { # items can be added but never re-ordered +0: lambda_notation, +1: auto_symbol, +2: repeated_decimals, +3: auto_number, +4: factorial_notation, +5: implicit_multiplication_application, +6: convert_xor, +7: implicit_application, +8: implicit_multiplication, +9: convert_equals_signs, +10: function_exponentiation, +11: rationalize} + +transformations = '\n'.join('%s: %s' % (i, func_name(f)) for i, f in _transformation.items()) + + +class _T(): + """class to retrieve transformations from a given slice + + EXAMPLES + ======== + + >>> from sympy.parsing.sympy_parser import T, standard_transformations + >>> assert T[:5] == standard_transformations + """ + def __init__(self): + self.N = len(_transformation) + + def __str__(self): + return transformations + + def __getitem__(self, t): + if not type(t) is tuple: + t = (t,) + i = [] + for ti in t: + if type(ti) is int: + i.append(range(self.N)[ti]) + elif type(ti) is slice: + i.extend(range(*ti.indices(self.N))) + else: + raise TypeError('unexpected slice arg') + return tuple([_transformation[_] for _ in i]) + +T = _T() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..24572190df72f9be11b5830355b0d6b9e3bb53ad --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py @@ -0,0 +1,25 @@ +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.parsing.ast_parser import parse_expr +from sympy.testing.pytest import raises +from sympy.core.sympify import SympifyError +import warnings + +def test_parse_expr(): + a, b = symbols('a, b') + # tests issue_16393 + assert parse_expr('a + b', {}) == a + b + raises(SympifyError, lambda: parse_expr('a + ', {})) + + # tests Transform.visit_Constant + assert parse_expr('1 + 2', {}) == S(3) + assert parse_expr('1 + 2.0', {}) == S(3.0) + + # tests Transform.visit_Name + assert parse_expr('Rational(1, 2)', {}) == S(1)/2 + assert parse_expr('a', {'a': a}) == a + + # tests issue_23092 + with warnings.catch_warnings(): + warnings.simplefilter('error') + assert parse_expr('6 * 7', {}) == S(42) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py new file mode 100644 index 0000000000000000000000000000000000000000..dfcaef13565c5e2187dc6e90113b407a7967c331 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py @@ -0,0 +1,178 @@ +import os + +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.external import import_module +from sympy.testing.pytest import skip +from sympy.parsing.autolev import parse_autolev + +antlr4 = import_module("antlr4") + +if not antlr4: + disabled = True + +FILE_DIR = os.path.dirname( + os.path.dirname(os.path.abspath(os.path.realpath(__file__)))) + + +def _test_examples(in_filename, out_filename, test_name=""): + + in_file_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + in_filename) + correct_file_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + out_filename) + with open(in_file_path) as f: + generated_code = parse_autolev(f, include_numeric=True) + + with open(correct_file_path) as f: + for idx, line1 in enumerate(f): + if line1.startswith("#"): + break + try: + line2 = generated_code.split('\n')[idx] + assert line1.rstrip() == line2.rstrip() + except Exception: + msg = 'mismatch in ' + test_name + ' in line no: {0}' + raise AssertionError(msg.format(idx+1)) + + +def test_rule_tests(): + + l = ["ruletest1", "ruletest2", "ruletest3", "ruletest4", "ruletest5", + "ruletest6", "ruletest7", "ruletest8", "ruletest9", "ruletest10", + "ruletest11", "ruletest12"] + + for i in l: + in_filepath = i + ".al" + out_filepath = i + ".py" + _test_examples(in_filepath, out_filepath, i) + + +def test_pydy_examples(): + + l = ["mass_spring_damper", "chaos_pendulum", "double_pendulum", + "non_min_pendulum"] + + for i in l: + in_filepath = os.path.join("pydy-example-repo", i + ".al") + out_filepath = os.path.join("pydy-example-repo", i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_autolev_tutorial(): + + dir_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + 'autolev-tutorial') + + if os.path.isdir(dir_path): + l = ["tutor1", "tutor2", "tutor3", "tutor4", "tutor5", "tutor6", + "tutor7"] + for i in l: + in_filepath = os.path.join("autolev-tutorial", i + ".al") + out_filepath = os.path.join("autolev-tutorial", i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_dynamics_online(): + + dir_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + 'dynamics-online') + + if os.path.isdir(dir_path): + ch1 = ["1-4", "1-5", "1-6", "1-7", "1-8", "1-9_1", "1-9_2", "1-9_3"] + ch2 = ["2-1", "2-2", "2-3", "2-4", "2-5", "2-6", "2-7", "2-8", "2-9", + "circular"] + ch3 = ["3-1_1", "3-1_2", "3-2_1", "3-2_2", "3-2_3", "3-2_4", "3-2_5", + "3-3"] + ch4 = ["4-1_1", "4-2_1", "4-4_1", "4-4_2", "4-5_1", "4-5_2"] + chapters = [(ch1, "ch1"), (ch2, "ch2"), (ch3, "ch3"), (ch4, "ch4")] + for ch, name in chapters: + for i in ch: + in_filepath = os.path.join("dynamics-online", name, i + ".al") + out_filepath = os.path.join("dynamics-online", name, i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_output_01(): + """Autolev example calculates the position, velocity, and acceleration of a + point and expresses in a single reference frame:: + + (1) FRAMES C,D,F + (2) VARIABLES FD'',DC'' + (3) CONSTANTS R,L + (4) POINTS O,E + (5) SIMPROT(F,D,1,FD) + -> (6) F_D = [1, 0, 0; 0, COS(FD), -SIN(FD); 0, SIN(FD), COS(FD)] + (7) SIMPROT(D,C,2,DC) + -> (8) D_C = [COS(DC), 0, SIN(DC); 0, 1, 0; -SIN(DC), 0, COS(DC)] + (9) W_C_F> = EXPRESS(W_C_F>, F) + -> (10) W_C_F> = FD'*F1> + COS(FD)*DC'*F2> + SIN(FD)*DC'*F3> + (11) P_O_E>=R*D2>-L*C1> + (12) P_O_E>=EXPRESS(P_O_E>, D) + -> (13) P_O_E> = -L*COS(DC)*D1> + R*D2> + L*SIN(DC)*D3> + (14) V_E_F>=EXPRESS(DT(P_O_E>,F),D) + -> (15) V_E_F> = L*SIN(DC)*DC'*D1> - L*SIN(DC)*FD'*D2> + (R*FD'+L*COS(DC)*DC')*D3> + (16) A_E_F>=EXPRESS(DT(V_E_F>,F),D) + -> (17) A_E_F> = L*(COS(DC)*DC'^2+SIN(DC)*DC'')*D1> + (-R*FD'^2-2*L*COS(DC)*DC'*FD'-L*SIN(DC)*FD'')*D2> + (R*FD''+L*COS(DC)*DC''-L*SIN(DC)*DC'^2-L*SIN(DC)*FD'^2)*D3> + + """ + + if not antlr4: + skip('Test skipped: antlr4 is not installed.') + + autolev_input = """\ +FRAMES C,D,F +VARIABLES FD'',DC'' +CONSTANTS R,L +POINTS O,E +SIMPROT(F,D,1,FD) +SIMPROT(D,C,2,DC) +W_C_F>=EXPRESS(W_C_F>,F) +P_O_E>=R*D2>-L*C1> +P_O_E>=EXPRESS(P_O_E>,D) +V_E_F>=EXPRESS(DT(P_O_E>,F),D) +A_E_F>=EXPRESS(DT(V_E_F>,F),D)\ +""" + + sympy_input = parse_autolev(autolev_input) + + g = {} + l = {} + exec(sympy_input, g, l) + + w_c_f = l['frame_c'].ang_vel_in(l['frame_f']) + # P_O_E> means "the position of point E wrt to point O" + p_o_e = l['point_e'].pos_from(l['point_o']) + v_e_f = l['point_e'].vel(l['frame_f']) + a_e_f = l['point_e'].acc(l['frame_f']) + + # NOTE : The Autolev outputs above were manually transformed into + # equivalent SymPy physics vector expressions. Would be nice to automate + # this transformation. + expected_w_c_f = (l['fd'].diff()*l['frame_f'].x + + cos(l['fd'])*l['dc'].diff()*l['frame_f'].y + + sin(l['fd'])*l['dc'].diff()*l['frame_f'].z) + + assert (w_c_f - expected_w_c_f).simplify() == 0 + + expected_p_o_e = (-l['l']*cos(l['dc'])*l['frame_d'].x + + l['r']*l['frame_d'].y + + l['l']*sin(l['dc'])*l['frame_d'].z) + + assert (p_o_e - expected_p_o_e).simplify() == 0 + + expected_v_e_f = (l['l']*sin(l['dc'])*l['dc'].diff()*l['frame_d'].x - + l['l']*sin(l['dc'])*l['fd'].diff()*l['frame_d'].y + + (l['r']*l['fd'].diff() + + l['l']*cos(l['dc'])*l['dc'].diff())*l['frame_d'].z) + assert (v_e_f - expected_v_e_f).simplify() == 0 + + expected_a_e_f = (l['l']*(cos(l['dc'])*l['dc'].diff()**2 + + sin(l['dc'])*l['dc'].diff().diff())*l['frame_d'].x + + (-l['r']*l['fd'].diff()**2 - + 2*l['l']*cos(l['dc'])*l['dc'].diff()*l['fd'].diff() - + l['l']*sin(l['dc'])*l['fd'].diff().diff())*l['frame_d'].y + + (l['r']*l['fd'].diff().diff() + + l['l']*cos(l['dc'])*l['dc'].diff().diff() - + l['l']*sin(l['dc'])*l['dc'].diff()**2 - + l['l']*sin(l['dc'])*l['fd'].diff()**2)*l['frame_d'].z) + assert (a_e_f - expected_a_e_f).simplify() == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..b74622e40030cba180cb4fc354216ccca119baec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py @@ -0,0 +1,5248 @@ +from sympy.parsing.sym_expr import SymPyExpression +from sympy.testing.pytest import raises, XFAIL +from sympy.external import import_module + +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +if cin: + from sympy.codegen.ast import (Variable, String, Return, + FunctionDefinition, Integer, Float, Declaration, CodeBlock, + FunctionPrototype, FunctionCall, NoneToken, Assignment, Type, + IntBaseType, SignedIntType, UnsignedIntType, FloatType, + AddAugmentedAssignment, SubAugmentedAssignment, + MulAugmentedAssignment, DivAugmentedAssignment, + ModAugmentedAssignment, While) + from sympy.codegen.cnodes import (PreDecrement, PostDecrement, + PreIncrement, PostIncrement) + from sympy.core import (Add, Mul, Mod, Pow, Rational, + StrictLessThan, LessThan, StrictGreaterThan, GreaterThan, + Equality, Unequality) + from sympy.logic.boolalg import And, Not, Or + from sympy.core.symbol import Symbol + from sympy.logic.boolalg import (false, true) + import os + + def test_variable(): + c_src1 = ( + 'int a;' + '\n' + + 'int b;' + '\n' + ) + c_src2 = ( + 'float a;' + '\n' + + 'float b;' + '\n' + ) + c_src3 = ( + 'int a;' + '\n' + + 'float b;' + '\n' + + 'int c;' + ) + c_src4 = ( + 'int x = 1, y = 6.78;' + '\n' + + 'float p = 2, q = 9.67;' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + + assert res1[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + + assert res3[2] == Declaration( + Variable( + Symbol('c'), + type=IntBaseType(String('intc')) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('intc')), + value=Integer(6) + ) + ) + + assert res4[2] == Declaration( + Variable( + Symbol('p'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.0', precision=53) + ) + ) + + assert res4[3] == Declaration( + Variable( + Symbol('q'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('9.67', precision=53) + ) + ) + + + def test_int(): + c_src1 = 'int a = 1;' + c_src2 = ( + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + ) + c_src3 = 'int a = 2.345, b = 5.67;' + c_src4 = 'int p = 6, q = 23.45;' + c_src5 = "int x = '0', y = 'a';" + c_src6 = "int r = true, s = false;" + + # cin.TypeKind.UCHAR + c_src_type1 = ( + "signed char a = 1, b = 5.1;" + ) + + # cin.TypeKind.SHORT + c_src_type2 = ( + "short a = 1, b = 5.1;" + "signed short c = 1, d = 5.1;" + "short int e = 1, f = 5.1;" + "signed short int g = 1, h = 5.1;" + ) + + # cin.TypeKind.INT + c_src_type3 = ( + "signed int a = 1, b = 5.1;" + "int c = 1, d = 5.1;" + ) + + # cin.TypeKind.LONG + c_src_type4 = ( + "long a = 1, b = 5.1;" + "long int c = 1, d = 5.1;" + ) + + # cin.TypeKind.UCHAR + c_src_type5 = "unsigned char a = 1, b = 5.1;" + + # cin.TypeKind.USHORT + c_src_type6 = ( + "unsigned short a = 1, b = 5.1;" + "unsigned short int c = 1, d = 5.1;" + ) + + # cin.TypeKind.UINT + c_src_type7 = "unsigned int a = 1, b = 5.1;" + + # cin.TypeKind.ULONG + c_src_type8 = ( + "unsigned long a = 1, b = 5.1;" + "unsigned long int c = 1, d = 5.1;" + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + + res_type1 = SymPyExpression(c_src_type1, 'c').return_expr() + res_type2 = SymPyExpression(c_src_type2, 'c').return_expr() + res_type3 = SymPyExpression(c_src_type3, 'c').return_expr() + res_type4 = SymPyExpression(c_src_type4, 'c').return_expr() + res_type5 = SymPyExpression(c_src_type5, 'c').return_expr() + res_type6 = SymPyExpression(c_src_type6, 'c').return_expr() + res_type7 = SymPyExpression(c_src_type7, 'c').return_expr() + res_type8 = SymPyExpression(c_src_type8, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('p'), + type=IntBaseType(String('intc')), + value=Integer(6) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('q'), + type=IntBaseType(String('intc')), + value=Integer(23) + ) + ) + + assert res5[0] == Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('intc')), + value=Integer(48) + ) + ) + + assert res5[1] == Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('intc')), + value=Integer(97) + ) + ) + + assert res6[0] == Declaration( + Variable( + Symbol('r'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res6[1] == Declaration( + Variable( + Symbol('s'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ) + + assert res_type1[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int8'), + nbits=Integer(8) + ), + value=Integer(1) + ) + ) + + assert res_type1[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int8'), + nbits=Integer(8) + ), + value=Integer(5) + ) + ) + + assert res_type2[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[2] == Declaration( + Variable(Symbol('c'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[3] == Declaration( + Variable( + Symbol('d'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[4] == Declaration( + Variable( + Symbol('e'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[5] == Declaration( + Variable( + Symbol('f'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[6] == Declaration( + Variable( + Symbol('g'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[7] == Declaration( + Variable( + Symbol('h'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res_type3[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res_type3[2] == Declaration( + Variable( + Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res_type3[3] == Declaration( + Variable( + Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res_type4[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type4[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type4[2] == Declaration( + Variable( + Symbol('c'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type4[3] == Declaration( + Variable( + Symbol('d'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type5[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint8'), + nbits=Integer(8) + ), + value=Integer(1) + ) + ) + + assert res_type5[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint8'), + nbits=Integer(8) + ), + value=Integer(5) + ) + ) + + assert res_type6[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type6[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type6[2] == Declaration( + Variable( + Symbol('c'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type6[3] == Declaration( + Variable( + Symbol('d'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type7[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint32'), + nbits=Integer(32) + ), + value=Integer(1) + ) + ) + + assert res_type7[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint32'), + nbits=Integer(32) + ), + value=Integer(5) + ) + ) + + assert res_type8[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type8[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type8[2] == Declaration( + Variable( + Symbol('c'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type8[3] == Declaration( + Variable( + Symbol('d'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + + def test_float(): + c_src1 = 'float a = 1.0;' + c_src2 = ( + 'float a = 1.25;' + '\n' + + 'float b = 2.39;' + '\n' + ) + c_src3 = 'float x = 1, y = 2;' + c_src4 = 'float p = 5, e = 7.89;' + c_src5 = 'float r = true, s = false;' + + # cin.TypeKind.FLOAT + c_src_type1 = 'float x = 1, y = 2.5;' + + # cin.TypeKind.DOUBLE + c_src_type2 = 'double x = 1, y = 2.5;' + + # cin.TypeKind.LONGDOUBLE + c_src_type3 = 'long double x = 1, y = 2.5;' + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + res_type1 = SymPyExpression(c_src_type1, 'c').return_expr() + res_type2 = SymPyExpression(c_src_type2, 'c').return_expr() + res_type3 = SymPyExpression(c_src_type3, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.3900000000000001', precision=53) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.0', precision=53) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('p'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('5.0', precision=53) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('e'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('7.89', precision=53) + ) + ) + + assert res5[0] == Declaration( + Variable( + Symbol('r'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res5[1] == Declaration( + Variable( + Symbol('s'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('0.0', precision=53) + ) + ) + + assert res_type1[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type1[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + assert res_type2[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float64'), + nbits=Integer(64), + nmant=Integer(52), + nexp=Integer(11) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type2[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float64'), + nbits=Integer(64), + nmant=Integer(52), + nexp=Integer(11) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res_type3[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float80'), + nbits=Integer(80), + nmant=Integer(63), + nexp=Integer(15) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type3[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float80'), + nbits=Integer(80), + nmant=Integer(63), + nexp=Integer(15) + ), + value=Float('2.5', precision=53) + ) + ) + + + def test_bool(): + c_src1 = ( + 'bool a = true, b = false;' + ) + + c_src2 = ( + 'bool a = 1, b = 0;' + ) + + c_src3 = ( + 'bool a = 10, b = 20;' + ) + + c_src4 = ( + 'bool a = 19.1, b = 9.0, c = 0.0;' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=false + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true) + ) + + assert res2[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=false + ) + ) + + assert res3[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res3[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res4[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true) + ) + + assert res4[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res4[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_function(): + c_src1 = ( + 'void fun1()' + '\n' + + '{' + '\n' + + 'int a;' + '\n' + + '}' + ) + c_src2 = ( + 'int fun2()' + '\n' + + '{'+ '\n' + + 'int a;' + '\n' + + 'return a;' + '\n' + + '}' + ) + c_src3 = ( + 'float fun3()' + '\n' + + '{' + '\n' + + 'float b;' + '\n' + + 'return b;' + '\n' + + '}' + ) + c_src4 = ( + 'float fun4()' + '\n' + + '{}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Return('a') + ) + ) + + assert res3[0] == FunctionDefinition( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun3'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Return('b') + ) + ) + + assert res4[0] == FunctionPrototype( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun4'), + parameters=() + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_parameters(): + c_src1 = ( + 'void fun1( int a)' + '\n' + + '{' + '\n' + + 'int i;' + '\n' + + '}' + ) + c_src2 = ( + 'int fun2(float x, float y)' + '\n' + + '{'+ '\n' + + 'int a;' + '\n' + + 'return a;' + '\n' + + '}' + ) + c_src3 = ( + 'float fun3(int p, float q, int r)' + '\n' + + '{' + '\n' + + 'float b;' + '\n' + + 'return b;' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('i'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Return('a') + ) + ) + + assert res3[0] == FunctionDefinition( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun3'), + parameters=( + Variable( + Symbol('p'), + type=IntBaseType(String('intc')) + ), + Variable( + Symbol('q'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable( + Symbol('r'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Return('b') + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_function_call(): + c_src1 = ( + 'int fun1(int x)' + '\n' + + '{' + '\n' + + 'return x;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int x = fun1(2);' + '\n' + + '}' + ) + + c_src2 = ( + 'int fun2(int a, int b, int c)' + '\n' + + '{' + '\n' + + 'return a;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int y = fun2(2, 3, 4);' + '\n' + + '}' + ) + + c_src3 = ( + 'int fun3(int a, int b, int c)' + '\n' + + '{' + '\n' + + 'return b;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int p;' + '\n' + + 'int q;' + '\n' + + 'int r;' + '\n' + + 'int z = fun3(p, q, r);' + '\n' + + '}' + ) + + c_src4 = ( + 'int fun4(float a, float b, int c)' + '\n' + + '{' + '\n' + + 'return c;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'float x;' + '\n' + + 'float y;' + '\n' + + 'int z;' + '\n' + + 'int i = fun4(x, y, z)' + '\n' + + '}' + ) + + c_src5 = ( + 'int fun()' + '\n' + + '{' + '\n' + + 'return 1;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int a = fun()' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + + assert res1[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun1'), + parameters=(Variable(Symbol('x'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Return('x') + ) + ) + + assert res1[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('x'), + value=FunctionCall(String('fun1'), + function_args=( + Integer(2), + ) + ) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=(Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('a') + ) + ) + + assert res2[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('y'), + value=FunctionCall( + String('fun2'), + function_args=( + Integer(2), + Integer(3), + Integer(4) + ) + ) + ) + ) + ) + ) + + assert res3[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun3'), + parameters=( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('b') + ) + ) + + assert res3[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('p'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('q'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('r'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('z'), + value=FunctionCall( + String('fun3'), + function_args=( + Symbol('p'), + Symbol('q'), + Symbol('r') + ) + ) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun4'), + parameters=(Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('c') + ) + ) + + assert res4[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('z'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('i'), + value=FunctionCall(String('fun4'), + function_args=( + Symbol('x'), + Symbol('y'), + Symbol('z') + ) + ) + ) + ) + ) + ) + + assert res5[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun'), + parameters=(), + body=CodeBlock( + Return('') + ) + ) + + assert res5[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + value=FunctionCall(String('fun'), + function_args=() + ) + ) + ) + ) + ) + + + def test_parse(): + c_src1 = ( + 'int a;' + '\n' + + 'int b;' + '\n' + ) + c_src2 = ( + 'void fun1()' + '\n' + + '{' + '\n' + + 'int a;' + '\n' + + '}' + ) + + f1 = open('..a.h', 'w') + f2 = open('..b.h', 'w') + + f1.write(c_src1) + f2. write(c_src2) + + f1.close() + f2.close() + + res1 = SymPyExpression('..a.h', 'c').return_expr() + res2 = SymPyExpression('..b.h', 'c').return_expr() + + os.remove('..a.h') + os.remove('..b.h') + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + assert res1[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')) + ) + ) + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + + def test_binary_operators(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 1;' + '\n' + + '}' + ) + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 0;' + '\n' + + 'a = a + 1;' + '\n' + + 'a = 3*a - 10;' + '\n' + + '}' + ) + c_src3 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'a = 1 + a - 3 * 6;' + '\n' + + '}' + ) + c_src4 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'a = 100;' + '\n' + + 'b = a*a + a*a + a + 19*a + 1 + 24;' + '\n' + + '}' + ) + c_src5 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'int c;' + '\n' + + 'int d;' + '\n' + + 'a = 1;' + '\n' + + 'b = 2;' + '\n' + + 'c = b;' + '\n' + + 'd = ((a+b)*(a+c))*((c-d)*(a+c));' + '\n' + + '}' + ) + c_src6 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'int c;' + '\n' + + 'int d;' + '\n' + + 'a = 1;' + '\n' + + 'b = 2;' + '\n' + + 'c = 3;' + '\n' + + 'd = (a*a*a*a + 3*b*b + b + b + c*d);' + '\n' + + '}' + ) + c_src7 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 1.01;' + '\n' + + '}' + ) + + c_src8 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 10.0 + 2.5;' + '\n' + + '}' + ) + + c_src9 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 10.0 / 2.5;' + '\n' + + '}' + ) + + c_src10 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 100 / 4;' + '\n' + + '}' + ) + + c_src11 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 20 - 100 / 4 * 5 + 10;' + '\n' + + '}' + ) + + c_src12 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = (20 - 100) / 4 * (5 + 10);' + '\n' + + '}' + ) + + c_src13 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'float c;' + '\n' + + 'c = b/a;' + '\n' + + '}' + ) + + c_src14 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 2;' + '\n' + + 'int d = 5;' + '\n' + + 'int n = 10;' + '\n' + + 'int s;' + '\n' + + 's = (a/2)*(2*a + (n-1)*d);' + '\n' + + '}' + ) + + c_src15 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 1 % 2;' + '\n' + + '}' + ) + + c_src16 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 2;' + '\n' + + 'int b;' + '\n' + + 'b = a % 3;' + '\n' + + '}' + ) + + c_src17 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int c;' + '\n' + + 'c = a % b;' + '\n' + + '}' + ) + + c_src18 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c;' + '\n' + + 'c = (a + b * (100/a)) % mod;' + '\n' + + '}' + ) + + c_src19 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c;' + '\n' + + 'c = ((a % mod + b % mod) % mod' \ + '* (a % mod - b % mod) % mod) % mod;' + '\n' + + '}' + ) + + c_src20 = ( + 'void func()'+ + '{' + '\n' + + 'bool a' + '\n' + + 'bool b;' + '\n' + + 'a = 1 == 2;' + '\n' + + 'b = 1 != 2;' + '\n' + + '}' + ) + + c_src21 = ( + 'void func()'+ + '{' + '\n' + + 'bool a;' + '\n' + + 'bool b;' + '\n' + + 'bool c;' + '\n' + + 'bool d;' + '\n' + + 'a = 1 == 2;' + '\n' + + 'b = 1 <= 2;' + '\n' + + 'c = 1 > 2;' + '\n' + + 'd = 1 >= 2;' + '\n' + + '}' + ) + + c_src22 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + 'bool c7;' + '\n' + + 'bool c8;' + '\n' + + + 'c1 = a == 1;' + '\n' + + 'c2 = b == 2;' + '\n' + + + 'c3 = 1 != a;' + '\n' + + 'c4 = 1 != b;' + '\n' + + + 'c5 = a < 0;' + '\n' + + 'c6 = b <= 10;' + '\n' + + 'c7 = a > 0;' + '\n' + + 'c8 = b >= 11;' + '\n' + + '}' + ) + + c_src23 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 3;' + '\n' + + 'int b = 4;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a == b;' + '\n' + + 'c2 = a != b;' + '\n' + + 'c3 = a < b;' + '\n' + + 'c4 = a <= b;' + '\n' + + 'c5 = a > b;' + '\n' + + 'c6 = a >= b;' + '\n' + + '}' + ) + + c_src24 = ( + 'void func()'+ + '{' + '\n' + + 'float a = 1.25' + 'float b = 2.5;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a == 1.25;' + '\n' + + 'c2 = b == 2.54;' + '\n' + + + 'c3 = 1.2 != a;' + '\n' + + 'c4 = 1.5 != b;' + '\n' + + '}' + ) + + c_src25 = ( + 'void func()'+ + '{' + '\n' + + 'float a = 1.25' + '\n' + + 'float b = 2.5;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a == b;' + '\n' + + 'c2 = a != b;' + '\n' + + 'c3 = a < b;' + '\n' + + 'c4 = a <= b;' + '\n' + + 'c5 = a > b;' + '\n' + + 'c6 = a >= b;' + '\n' + + '}' + ) + + c_src26 = ( + 'void func()'+ + '{' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = true == true;' + '\n' + + 'c2 = true == false;' + '\n' + + 'c3 = false == false;' + '\n' + + + 'c4 = true != true;' + '\n' + + 'c5 = true != false;' + '\n' + + 'c6 = false != false;' + '\n' + + '}' + ) + + c_src27 = ( + 'void func()'+ + '{' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = true && true;' + '\n' + + 'c2 = true && false;' + '\n' + + 'c3 = false && false;' + '\n' + + + 'c4 = true || true;' + '\n' + + 'c5 = true || false;' + '\n' + + 'c6 = false || false;' + '\n' + + '}' + ) + + c_src28 = ( + 'void func()'+ + '{' + '\n' + + 'bool a;' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a && true;' + '\n' + + 'c2 = false && a;' + '\n' + + + 'c3 = true || a;' + '\n' + + 'c4 = a || false;' + '\n' + + '}' + ) + + c_src29 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a && 1;' + '\n' + + 'c2 = a && 0;' + '\n' + + + 'c3 = a || 1;' + '\n' + + 'c4 = 0 || a;' + '\n' + + '}' + ) + + c_src30 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'bool c;'+ '\n' + + 'bool d;'+ '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a && b;' + '\n' + + 'c2 = a && c;' + '\n' + + 'c3 = c && d;' + '\n' + + + 'c4 = a || b;' + '\n' + + 'c5 = a || c;' + '\n' + + 'c6 = c || d;' + '\n' + + '}' + ) + + c_src_raise1 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = -1;' + '\n' + + '}' + ) + + c_src_raise2 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = -+1;' + '\n' + + '}' + ) + + c_src_raise3 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 2*-2;' + '\n' + + '}' + ) + + c_src_raise4 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = (int)2.0;' + '\n' + + '}' + ) + + c_src_raise5 = ( + 'void func()'+ + '{' + '\n' + + 'int a=100;' + '\n' + + 'a = (a==100)?(1):(0);' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + res7 = SymPyExpression(c_src7, 'c').return_expr() + res8 = SymPyExpression(c_src8, 'c').return_expr() + res9 = SymPyExpression(c_src9, 'c').return_expr() + res10 = SymPyExpression(c_src10, 'c').return_expr() + res11 = SymPyExpression(c_src11, 'c').return_expr() + res12 = SymPyExpression(c_src12, 'c').return_expr() + res13 = SymPyExpression(c_src13, 'c').return_expr() + res14 = SymPyExpression(c_src14, 'c').return_expr() + res15 = SymPyExpression(c_src15, 'c').return_expr() + res16 = SymPyExpression(c_src16, 'c').return_expr() + res17 = SymPyExpression(c_src17, 'c').return_expr() + res18 = SymPyExpression(c_src18, 'c').return_expr() + res19 = SymPyExpression(c_src19, 'c').return_expr() + res20 = SymPyExpression(c_src20, 'c').return_expr() + res21 = SymPyExpression(c_src21, 'c').return_expr() + res22 = SymPyExpression(c_src22, 'c').return_expr() + res23 = SymPyExpression(c_src23, 'c').return_expr() + res24 = SymPyExpression(c_src24, 'c').return_expr() + res25 = SymPyExpression(c_src25, 'c').return_expr() + res26 = SymPyExpression(c_src26, 'c').return_expr() + res27 = SymPyExpression(c_src27, 'c').return_expr() + res28 = SymPyExpression(c_src28, 'c').return_expr() + res29 = SymPyExpression(c_src29, 'c').return_expr() + res30 = SymPyExpression(c_src30, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment(Variable(Symbol('a')), Integer(1)) + ) + ) + + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(0))), + Assignment( + Variable(Symbol('a')), + Add(Symbol('a'), + Integer(1)) + ), + Assignment(Variable(Symbol('a')), + Add( + Mul( + Integer(3), + Symbol('a')), + Integer(-10) + ) + ) + ) + ) + + assert res3[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Assignment( + Variable(Symbol('a')), + Add( + Symbol('a'), + Integer(-17) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(100)), + Assignment( + Variable(Symbol('b')), + Add( + Mul( + Integer(2), + Pow( + Symbol('a'), + Integer(2)) + ), + Mul( + Integer(20), + Symbol('a')), + Integer(25) + ) + ) + ) + ) + + assert res5[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1)), + Assignment( + Variable(Symbol('b')), + Integer(2) + ), + Assignment( + Variable(Symbol('c')), + Symbol('b')), + Assignment( + Variable(Symbol('d')), + Mul( + Add( + Symbol('a'), + Symbol('b')), + Pow( + Add( + Symbol('a'), + Symbol('c') + ), + Integer(2) + ), + Add( + Symbol('c'), + Mul( + Integer(-1), + Symbol('d') + ) + ) + ) + ) + ) + ) + + assert res6[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1) + ), + Assignment( + Variable(Symbol('b')), + Integer(2) + ), + Assignment( + Variable(Symbol('c')), + Integer(3) + ), + Assignment( + Variable(Symbol('d')), + Add( + Pow( + Symbol('a'), + Integer(4) + ), + Mul( + Integer(3), + Pow( + Symbol('b'), + Integer(2) + ) + ), + Mul( + Integer(2), + Symbol('b') + ), + Mul( + Symbol('c'), + Symbol('d') + ) + ) + ) + ) + ) + + assert res7[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('1.01', precision=53) + ) + ) + ) + + assert res8[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('12.5', precision=53) + ) + ) + ) + + assert res9[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('4.0', precision=53) + ) + ) + ) + + assert res10[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(25) + ) + ) + ) + + assert res11[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(-95) + ) + ) + ) + + assert res12[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(-300) + ) + ) + ) + + assert res13[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('c')), + Mul( + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ) + ) + ) + + assert res14[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ), + Declaration( + Variable(Symbol('n'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('s'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('s')), + Mul( + Rational(1, 2), + Symbol('a'), + Add( + Mul( + Integer(2), + Symbol('a') + ), + Mul( + Symbol('d'), + Add( + Symbol('n'), + Integer(-1) + ) + ) + ) + ) + ) + ) + ) + + assert res15[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1) + ) + ) + ) + + assert res16[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('b')), + Mod( + Symbol('a'), + Integer(3) + ) + ) + ) + ) + + assert res17[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res18[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Add( + Symbol('a'), + Mul( + Integer(100), + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + ) + + assert res19[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Mul( + Add( + Mod( + Symbol('a'), + Symbol('mod') + ), + Mul( + Integer(-1), + Mod( + Symbol('b'), + Symbol('mod') + ) + ) + ), + Mod( + Add( + Symbol('a'), + Symbol('b') + ), + Symbol('mod') + ) + ), + Symbol('mod') + ) + ) + ) + ) + + assert res20[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('a')), + false + ), + Assignment( + Variable(Symbol('b')), + true + ) + ) + ) + + assert res21[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('a')), + false + ), + Assignment( + Variable(Symbol('b')), + true + ), + Assignment( + Variable(Symbol('c')), + false + ), + Assignment( + Variable(Symbol('d')), + false + ) + ) + ) + + assert res22[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c7'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c8'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Integer(1) + ) + ), + Assignment( + Variable(Symbol('c2')), + Equality( + Symbol('b'), + Integer(2) + ) + ), + Assignment( + Variable(Symbol('c3')), + Unequality( + Integer(1), + Symbol('a') + ) + ), + Assignment( + Variable(Symbol('c4')), + Unequality( + Integer(1), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictLessThan( + Symbol('a'), + Integer(0) + ) + ), + Assignment( + Variable(Symbol('c6')), + LessThan( + Symbol('b'), + Integer(10) + ) + ), + Assignment( + Variable(Symbol('c7')), + StrictGreaterThan( + Symbol('a'), + Integer(0) + ) + ), + Assignment( + Variable(Symbol('c8')), + GreaterThan( + Symbol('b'), + Integer(11) + ) + ) + ) + ) + + assert res23[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + Unequality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c3')), + StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c4')), + LessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c6')), + GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res24[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Float('1.25', precision=53) + ) + ), + Assignment( + Variable(Symbol('c3')), + Unequality( + Float('1.2', precision=53), + Symbol('a') + ) + ) + ) + ) + + + assert res25[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ), + Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool') + ) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + Unequality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c3')), + StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c4')), + LessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c6')), + GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res26[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), body=CodeBlock( + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + true + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + false + ), + Assignment( + Variable(Symbol('c5')), + true + ), + Assignment( + Variable(Symbol('c6')), + false + ) + ) + ) + + assert res27[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + true + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + false + ), + Assignment( + Variable(Symbol('c4')), + true + ), + Assignment( + Variable(Symbol('c5')), + true + ), + Assignment( + Variable(Symbol('c6')), + false) + ) + ) + + assert res28[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Symbol('a') + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + Symbol('a') + ) + ) + ) + + assert res29[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Symbol('a') + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + Symbol('a') + ) + ) + ) + + assert res30[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + And( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + And( + Symbol('a'), + Symbol('c') + ) + ), + Assignment( + Variable(Symbol('c3')), + And( + Symbol('c'), + Symbol('d') + ) + ), + Assignment( + Variable(Symbol('c4')), + Or( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + Or( + Symbol('a'), + Symbol('c') + ) + ), + Assignment( + Variable(Symbol('c6')), + Or( + Symbol('c'), + Symbol('d') + ) + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise3, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise4, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise5, 'c')) + + + @XFAIL + def test_var_decl(): + c_src1 = ( + 'int b = 100;' + '\n' + + 'int a = b;' + '\n' + ) + + c_src2 = ( + 'int a = 1;' + '\n' + + 'int b = a + 1;' + '\n' + ) + + c_src3 = ( + 'float a = 10.0 + 2.5;' + '\n' + + 'float b = a * 20.0;' + '\n' + ) + + c_src4 = ( + 'int a = 1 + 100 - 3 * 6;' + '\n' + ) + + c_src5 = ( + 'int a = (((1 + 100) * 12) - 3) * (6 - 10);' + '\n' + ) + + c_src6 = ( + 'int b = 2;' + '\n' + + 'int c = 3;' + '\n' + + 'int a = b + c * 4;' + '\n' + ) + + c_src7 = ( + 'int b = 1;' + '\n' + + 'int c = b + 2;' + '\n' + + 'int a = 10 * b * b * c;' + '\n' + ) + + c_src8 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + 'int temp = a;' + '\n' + + 'a = b;' + '\n' + + 'b = temp;' + '\n' + + '}' + ) + + c_src9 = ( + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + 'int c = a;' + '\n' + + 'int d = a + b + c;' + '\n' + + 'int e = a*a*a + 3*a*a*b + 3*a*b*b + b*b*b;' + '\n' + 'int f = (a + b + c) * (a + b - c);' + '\n' + + 'int g = (a + b + c + d)*(a + b + c + d)*(a * (b - c));' + + '\n' + ) + + c_src10 = ( + 'float a = 10.0;' + '\n' + + 'float b = 2.5;' + '\n' + + 'float c = a*a + 2*a*b + b*b;' + '\n' + ) + + c_src11 = ( + 'float a = 10.0 / 2.5;' + '\n' + ) + + c_src12 = ( + 'int a = 100 / 4;' + '\n' + ) + + c_src13 = ( + 'int a = 20 - 100 / 4 * 5 + 10;' + '\n' + ) + + c_src14 = ( + 'int a = (20 - 100) / 4 * (5 + 10);' + '\n' + ) + + c_src15 = ( + 'int a = 4;' + '\n' + + 'int b = 2;' + '\n' + + 'float c = b/a;' + '\n' + ) + + c_src16 = ( + 'int a = 2;' + '\n' + + 'int d = 5;' + '\n' + + 'int n = 10;' + '\n' + + 'int s = (a/2)*(2*a + (n-1)*d);' + '\n' + ) + + c_src17 = ( + 'int a = 1 % 2;' + '\n' + ) + + c_src18 = ( + 'int a = 2;' + '\n' + + 'int b = a % 3;' + '\n' + ) + + c_src19 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int c = a % b;' + '\n' + ) + + c_src20 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c = (a + b * (100/a)) % mod;' + '\n' + ) + + c_src21 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c = ((a % mod + b % mod) % mod *' \ + '(a % mod - b % mod) % mod) % mod;' + '\n' + ) + + c_src22 = ( + 'bool a = 1 == 2, b = 1 != 2;' + ) + + c_src23 = ( + 'bool a = 1 < 2, b = 1 <= 2, c = 1 > 2, d = 1 >= 2;' + ) + + c_src24 = ( + 'int a = 1, b = 2;' + '\n' + + + 'bool c1 = a == 1;' + '\n' + + 'bool c2 = b == 2;' + '\n' + + + 'bool c3 = 1 != a;' + '\n' + + 'bool c4 = 1 != b;' + '\n' + + + 'bool c5 = a < 0;' + '\n' + + 'bool c6 = b <= 10;' + '\n' + + 'bool c7 = a > 0;' + '\n' + + 'bool c8 = b >= 11;' + + ) + + c_src25 = ( + 'int a = 3, b = 4;' + '\n' + + + 'bool c1 = a == b;' + '\n' + + 'bool c2 = a != b;' + '\n' + + 'bool c3 = a < b;' + '\n' + + 'bool c4 = a <= b;' + '\n' + + 'bool c5 = a > b;' + '\n' + + 'bool c6 = a >= b;' + ) + + c_src26 = ( + 'float a = 1.25, b = 2.5;' + '\n' + + + 'bool c1 = a == 1.25;' + '\n' + + 'bool c2 = b == 2.54;' + '\n' + + + 'bool c3 = 1.2 != a;' + '\n' + + 'bool c4 = 1.5 != b;' + ) + + c_src27 = ( + 'float a = 1.25, b = 2.5;' + '\n' + + + 'bool c1 = a == b;' + '\n' + + 'bool c2 = a != b;' + '\n' + + 'bool c3 = a < b;' + '\n' + + 'bool c4 = a <= b;' + '\n' + + 'bool c5 = a > b;' + '\n' + + 'bool c6 = a >= b;' + ) + + c_src28 = ( + 'bool c1 = true == true;' + '\n' + + 'bool c2 = true == false;' + '\n' + + 'bool c3 = false == false;' + '\n' + + + 'bool c4 = true != true;' + '\n' + + 'bool c5 = true != false;' + '\n' + + 'bool c6 = false != false;' + ) + + c_src29 = ( + 'bool c1 = true && true;' + '\n' + + 'bool c2 = true && false;' + '\n' + + 'bool c3 = false && false;' + '\n' + + + 'bool c4 = true || true;' + '\n' + + 'bool c5 = true || false;' + '\n' + + 'bool c6 = false || false;' + ) + + c_src30 = ( + 'bool a = false;' + '\n' + + + 'bool c1 = a && true;' + '\n' + + 'bool c2 = false && a;' + '\n' + + + 'bool c3 = true || a;' + '\n' + + 'bool c4 = a || false;' + ) + + c_src31 = ( + 'int a = 1;' + '\n' + + + 'bool c1 = a && 1;' + '\n' + + 'bool c2 = a && 0;' + '\n' + + + 'bool c3 = a || 1;' + '\n' + + 'bool c4 = 0 || a;' + ) + + c_src32 = ( + 'int a = 1, b = 0;' + '\n' + + 'bool c = false, d = true;'+ '\n' + + + 'bool c1 = a && b;' + '\n' + + 'bool c2 = a && c;' + '\n' + + 'bool c3 = c && d;' + '\n' + + + 'bool c4 = a || b;' + '\n' + + 'bool c5 = a || c;' + '\n' + + 'bool c6 = c || d;' + ) + + c_src_raise1 = ( + "char a = 'b';" + ) + + c_src_raise2 = ( + 'int a[] = {10, 20};' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + res7 = SymPyExpression(c_src7, 'c').return_expr() + res8 = SymPyExpression(c_src8, 'c').return_expr() + res9 = SymPyExpression(c_src9, 'c').return_expr() + res10 = SymPyExpression(c_src10, 'c').return_expr() + res11 = SymPyExpression(c_src11, 'c').return_expr() + res12 = SymPyExpression(c_src12, 'c').return_expr() + res13 = SymPyExpression(c_src13, 'c').return_expr() + res14 = SymPyExpression(c_src14, 'c').return_expr() + res15 = SymPyExpression(c_src15, 'c').return_expr() + res16 = SymPyExpression(c_src16, 'c').return_expr() + res17 = SymPyExpression(c_src17, 'c').return_expr() + res18 = SymPyExpression(c_src18, 'c').return_expr() + res19 = SymPyExpression(c_src19, 'c').return_expr() + res20 = SymPyExpression(c_src20, 'c').return_expr() + res21 = SymPyExpression(c_src21, 'c').return_expr() + res22 = SymPyExpression(c_src22, 'c').return_expr() + res23 = SymPyExpression(c_src23, 'c').return_expr() + res24 = SymPyExpression(c_src24, 'c').return_expr() + res25 = SymPyExpression(c_src25, 'c').return_expr() + res26 = SymPyExpression(c_src26, 'c').return_expr() + res27 = SymPyExpression(c_src27, 'c').return_expr() + res28 = SymPyExpression(c_src28, 'c').return_expr() + res29 = SymPyExpression(c_src29, 'c').return_expr() + res30 = SymPyExpression(c_src30, 'c').return_expr() + res31 = SymPyExpression(c_src31, 'c').return_expr() + res32 = SymPyExpression(c_src32, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Symbol('b') + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration(Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res3[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('12.5', precision=53) + ) + ) + + assert res3[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Mul( + Float('20.0', precision=53), + Symbol('a') + ) + ) + ) + + assert res4[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(83) + ) + ) + + assert res5[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-4836) + ) + ) + + assert res6[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res6[1] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res6[2] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('b'), + Mul( + Integer(4), + Symbol('c') + ) + ) + ) + ) + + assert res7[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res7[1] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('b'), + Integer(2) + ) + ) + ) + + assert res7[2] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Mul( + Integer(10), + Pow( + Symbol('b'), + Integer(2) + ), + Symbol('c') + ) + ) + ) + + assert res8[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('temp'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ), + Assignment( + Variable(Symbol('a')), + Symbol('b') + ), + Assignment( + Variable(Symbol('b')), + Symbol('temp') + ) + ) + ) + + assert res9[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res9[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res9[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ) + + assert res9[3] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Symbol('b'), + Symbol('c') + ) + ) + ) + + assert res9[4] == Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=Add( + Pow( + Symbol('a'), + Integer(3) + ), + Mul( + Integer(3), + Pow( + Symbol('a'), + Integer(2) + ), + Symbol('b') + ), + Mul( + Integer(3), + Symbol('a'), + Pow( + Symbol('b'), + Integer(2) + ) + ), + Pow( + Symbol('b'), + Integer(3) + ) + ) + ) + ) + + assert res9[5] == Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=Mul( + Add( + Symbol('a'), + Symbol('b'), + Mul( + Integer(-1), + Symbol('c') + ) + ), + Add( + Symbol('a'), + Symbol('b'), + Symbol('c') + ) + ) + ) + ) + + assert res9[6] == Declaration( + Variable(Symbol('g'), + type=IntBaseType(String('intc')), + value=Mul( + Symbol('a'), + Add( + Symbol('b'), + Mul( + Integer(-1), + Symbol('c') + ) + ), + Pow( + Add( + Symbol('a'), + Symbol('b'), + Symbol('c'), + Symbol('d') + ), + Integer(2) + ) + ) + ) + ) + + assert res10[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('10.0', precision=53) + ) + ) + + assert res10[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res10[2] == Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Add( + Pow( + Symbol('a'), + Integer(2) + ), + Mul( + Integer(2), + Symbol('a'), + Symbol('b') + ), + Pow( + Symbol('b'), + Integer(2) + ) + ) + ) + ) + + assert res11[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('4.0', precision=53) + ) + ) + + assert res12[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(25) + ) + ) + + assert res13[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-95) + ) + ) + + assert res14[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-300) + ) + ) + + assert res15[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ) + + assert res15[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res15[2] == Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Mul( + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ) + ) + + assert res16[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res16[1] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res16[2] == Declaration( + Variable(Symbol('n'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ) + + assert res16[3] == Declaration( + Variable(Symbol('s'), + type=IntBaseType(String('intc')), + value=Mul( + Rational(1, 2), + Symbol('a'), + Add( + Mul( + Integer(2), + Symbol('a') + ), + Mul( + Symbol('d'), + Add( + Symbol('n'), + Integer(-1) + ) + ) + ) + ) + ) + ) + + assert res17[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res18[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res18[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Mod( + Symbol('a'), + Integer(3) + ) + ) + ) + + assert res19[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + assert res19[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res19[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res20[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res20[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res20[2] == Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ) + + assert res20[3] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Add( + Symbol('a'), + Mul( + Integer(100), + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + + assert res21[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res21[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res21[2] == Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ) + + assert res21[3] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Mul( + Add( + Symbol('a'), + Mul( + Integer(-1), + Symbol('b') + ) + ), + Add( + Symbol('a'), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + + assert res22[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=false + ) + ) + + assert res22[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + assert res23[3] == Declaration( + Variable(Symbol('d'), + type=Type(String('bool')), + value=false + ) + ) + + assert res24[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res24[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res24[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res24[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Equality( + Symbol('b'), + Integer(2) + ) + ) + ) + + assert res24[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=Unequality( + Integer(1), + Symbol('a') + ) + ) + ) + + assert res24[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Unequality( + Integer(1), + Symbol('b') + ) + ) + ) + + assert res24[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictLessThan(Symbol('a'), + Integer(0) + ) + ) + ) + + assert res24[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=LessThan( + Symbol('b'), + Integer(10) + ) + ) + ) + + assert res24[8] == Declaration( + Variable(Symbol('c7'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Integer(0) + ) + ) + ) + + assert res24[9] == Declaration( + Variable(Symbol('c8'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('b'), + Integer(11) + ) + ) + ) + + assert res25[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res25[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ) + + assert res25[2] == Declaration(Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Unequality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=LessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res26[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res26[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res26[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Float('1.25', precision=53) + ) + ) + ) + + assert res26[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Equality( + Symbol('b'), + Float('2.54', precision=53) + ) + ) + ) + + assert res26[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=Unequality( + Float('1.2', precision=53), + Symbol('a') + ) + ) + ) + + assert res26[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Unequality( + Float('1.5', precision=53), + Symbol('b') + ) + ) + ) + + assert res27[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res27[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res27[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Unequality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=LessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res28[0] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[1] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res28[2] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[3] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=false + ) + ) + + assert res28[4] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[5] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[0] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[1] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[2] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[3] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[4] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[5] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[1] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res30[2] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[3] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res30[4] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res31[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res31[1] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res31[2] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res31[3] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res31[4] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res32[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res32[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ) + + assert res32[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + assert res32[3] == Declaration( + Variable(Symbol('d'), + type=Type(String('bool')), + value=true + ) + ) + + assert res32[4] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=And( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res32[5] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=And( + Symbol('a'), + Symbol('c') + ) + ) + ) + + assert res32[6] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=And( + Symbol('c'), + Symbol('d') + ) + ) + ) + + assert res32[7] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Or( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res32[8] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=Or( + Symbol('a'), + Symbol('c') + ) + ) + ) + + assert res32[9] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=Or( + Symbol('c'), + Symbol('d') + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + + + def test_paren_expr(): + c_src1 = ( + 'int a = (1);' + 'int b = (1 + 2 * 3);' + ) + + c_src2 = ( + 'int a = 1, b = 2, c = 3;' + 'int d = (a);' + 'int e = (a + 1);' + 'int f = (a + b * c - d / e);' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(7) + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res2[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res2[3] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ) + + assert res2[4] == Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res2[5] == Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Mul( + Symbol('b'), + Symbol('c') + ), + Mul( + Integer(-1), + Symbol('d'), + Pow( + Symbol('e'), + Integer(-1) + ) + ) + ) + ) + ) + + + def test_unary_operators(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = 20;' + '\n' + + '++a;' + '\n' + + '--b;' + '\n' + + 'a++;' + '\n' + + 'b--;' + '\n' + + '}' + ) + + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = -100;' + '\n' + + 'int c = +19;' + '\n' + + 'int d = ++a;' + '\n' + + 'int e = --b;' + '\n' + + 'int f = a++;' + '\n' + + 'int g = b--;' + '\n' + + 'bool h = !false;' + '\n' + + 'bool i = !d;' + '\n' + + 'bool j = !0;' + '\n' + + 'bool k = !10.0;' + '\n' + + '}' + ) + + c_src_raise1 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = ~a;' + '\n' + + '}' + ) + + c_src_raise2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = *&a;' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(20) + ) + ), + PreIncrement(Symbol('a')), + PreDecrement(Symbol('b')), + PostIncrement(Symbol('a')), + PostDecrement(Symbol('b')) + ) + ) + + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(-100) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(19) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=PreIncrement(Symbol('a')) + ) + ), + Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=PreDecrement(Symbol('b')) + ) + ), + Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=PostIncrement(Symbol('a')) + ) + ), + Declaration( + Variable(Symbol('g'), + type=IntBaseType(String('intc')), + value=PostDecrement(Symbol('b')) + ) + ), + Declaration( + Variable(Symbol('h'), + type=Type(String('bool')), + value=true + ) + ), + Declaration( + Variable(Symbol('i'), + type=Type(String('bool')), + value=Not(Symbol('d')) + ) + ), + Declaration( + Variable(Symbol('j'), + type=Type(String('bool')), + value=true + ) + ), + Declaration( + Variable(Symbol('k'), + type=Type(String('bool')), + value=false + ) + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + + + def test_compound_assignment_operator(): + c_src = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'a += 10;' + '\n' + + 'a -= 10;' + '\n' + + 'a *= 10;' + '\n' + + 'a /= 10;' + '\n' + + 'a %= 10;' + '\n' + + '}' + ) + + res = SymPyExpression(c_src, 'c').return_expr() + + assert res[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + AddAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + SubAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + MulAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + DivAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + ModAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ) + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_while_stmt(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 0;' + '\n' + + 'while(i < 10)' + '\n' + + '{' + '\n' + + 'i++;' + '\n' + + '}' + '}' + ) + + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 0;' + '\n' + + 'while(i < 10)' + '\n' + + 'i++;' + '\n' + + '}' + ) + + c_src3 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 10;' + '\n' + + 'int cnt = 0;' + '\n' + + 'while(i > 0)' + '\n' + + '{' + '\n' + + 'i--;' + '\n' + + 'cnt++;' + '\n' + + '}' + '\n' + + '}' + ) + + c_src4 = ( + 'int digit_sum(int n)'+ + '{' + '\n' + + 'int sum = 0;' + '\n' + + 'while(n > 0)' + '\n' + + '{' + '\n' + + 'sum += (n % 10);' + '\n' + + 'n /= 10;' + '\n' + + '}' + '\n' + + 'return sum;' + '\n' + + '}' + ) + + c_src5 = ( + 'void func()'+ + '{' + '\n' + + 'while(1);' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('i'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictLessThan( + Symbol('i'), + Integer(10) + ), + body=CodeBlock( + PostIncrement( + Symbol('i') + ) + ) + ) + ) + ) + + assert res2[0] == res1[0] + + assert res3[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('i'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable( + Symbol('cnt'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictGreaterThan( + Symbol('i'), + Integer(0) + ), + body=CodeBlock( + PostDecrement( + Symbol('i') + ), + PostIncrement( + Symbol('cnt') + ) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('digit_sum'), + parameters=( + Variable( + Symbol('n'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('sum'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictGreaterThan( + Symbol('n'), + Integer(0) + ), + body=CodeBlock( + AddAugmentedAssignment( + Variable( + Symbol('sum') + ), + Mod( + Symbol('n'), + Integer(10) + ) + ), + DivAugmentedAssignment( + Variable( + Symbol('n') + ), + Integer(10) + ) + ) + ), + Return('sum') + ) + ) + + assert res5[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + While( + Integer(1), + body=CodeBlock( + NoneToken() + ) + ) + ) + ) + + +else: + def test_raise(): + from sympy.parsing.c.c_parser import CCodeConverter + raises(ImportError, lambda: CCodeConverter()) + raises(ImportError, lambda: SymPyExpression(' ', mode = 'c')) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py new file mode 100644 index 0000000000000000000000000000000000000000..f5eff1c9ec79528c7f9e3a06cf9e2f84c86091ee --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py @@ -0,0 +1,69 @@ +import os +import tempfile +from pathlib import Path + +import sympy +from sympy.testing.pytest import raises +from sympy.parsing.latex.lark import LarkLaTeXParser, TransformToSymPyExpr, parse_latex_lark +from sympy.external import import_module + +lark = import_module("lark") + +# disable tests if lark is not present +disabled = lark is None + +grammar_file = os.path.join(os.path.dirname(__file__), "../latex/lark/grammar/latex.lark") + +modification1 = """ +%override DIV_SYMBOL: DIV +%override MUL_SYMBOL: MUL | CMD_TIMES +""" + +modification2 = r""" +%override number: /\d+(,\d*)?/ +""" + +def init_custom_parser(modification, transformer=None): + latex_grammar = Path(grammar_file).read_text(encoding="utf-8") + latex_grammar += modification + + with tempfile.NamedTemporaryFile() as f: + f.write(bytes(latex_grammar, encoding="utf8")) + f.flush() + + parser = LarkLaTeXParser(grammar_file=f.name, transformer=transformer) + + return parser + +def test_custom1(): + # Removes the parser's ability to understand \cdot and \div. + + parser = init_custom_parser(modification1) + + with raises(lark.exceptions.UnexpectedCharacters): + parser.doparse(r"a \cdot b") + parser.doparse(r"x \div y") + +class CustomTransformer(TransformToSymPyExpr): + def number(self, tokens): + if "," in tokens[0]: + # The Float constructor expects a dot as the decimal separator + return sympy.core.numbers.Float(tokens[0].replace(",", ".")) + else: + return sympy.core.numbers.Integer(tokens[0]) + +def test_custom2(): + # Makes the parser parse commas as the decimal separator instead of dots + + parser = init_custom_parser(modification2, CustomTransformer) + + with raises(lark.exceptions.UnexpectedCharacters): + # Asserting that the default parser cannot parse numbers which have commas as + # the decimal separator + parse_latex_lark("100,1") + parse_latex_lark("0,009") + + parser.doparse("100,1") + parser.doparse("0,009") + parser.doparse("2,71828") + parser.doparse("3,14159") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9bcd54533ef231dd0a116910453dff0e993bc727 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py @@ -0,0 +1,406 @@ +from sympy.testing.pytest import raises +from sympy.parsing.sym_expr import SymPyExpression +from sympy.external import import_module + +lfortran = import_module('lfortran') + +if lfortran: + from sympy.codegen.ast import (Variable, IntBaseType, FloatBaseType, String, + Return, FunctionDefinition, Assignment, + Declaration, CodeBlock) + from sympy.core import Integer, Float, Add + from sympy.core.symbol import Symbol + + + expr1 = SymPyExpression() + expr2 = SymPyExpression() + src = """\ + integer :: a, b, c, d + real :: p, q, r, s + """ + + + def test_sym_expr(): + src1 = ( + src + + """\ + d = a + b -c + """ + ) + expr3 = SymPyExpression(src,'f') + expr4 = SymPyExpression(src1,'f') + ls1 = expr3.return_expr() + ls2 = expr4.return_expr() + for i in range(0, 7): + assert isinstance(ls1[i], Declaration) + assert isinstance(ls2[i], Declaration) + assert isinstance(ls2[8], Assignment) + assert ls1[0] == Declaration( + Variable( + Symbol('a'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[1] == Declaration( + Variable( + Symbol('b'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[2] == Declaration( + Variable( + Symbol('c'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[3] == Declaration( + Variable( + Symbol('d'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[4] == Declaration( + Variable( + Symbol('p'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[5] == Declaration( + Variable( + Symbol('q'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[6] == Declaration( + Variable( + Symbol('r'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[7] == Declaration( + Variable( + Symbol('s'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls2[8] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('b') - Symbol('c') + ) + + def test_assignment(): + src1 = ( + src + + """\ + a = b + c = d + p = q + r = s + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(0, 12): + if iter < 8: + assert isinstance(ls1[iter], Declaration) + else: + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('a')), + Variable(Symbol('b')) + ) + assert ls1[9] == Assignment( + Variable(Symbol('c')), + Variable(Symbol('d')) + ) + assert ls1[10] == Assignment( + Variable(Symbol('p')), + Variable(Symbol('q')) + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Variable(Symbol('s')) + ) + + + def test_binop_add(): + src1 = ( + src + + """\ + c = a + b + d = a + c + s = p + q + r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') + Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') + Symbol('q') + Symbol('r') + ) + + + def test_binop_sub(): + src1 = ( + src + + """\ + c = a - b + d = a - c + s = p - q - r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') - Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') - Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') - Symbol('q') - Symbol('r') + ) + + + def test_binop_mul(): + src1 = ( + src + + """\ + c = a * b + d = a * c + s = p * q * r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') * Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') * Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') * Symbol('q') * Symbol('r') + ) + + + def test_binop_div(): + src1 = ( + src + + """\ + c = a / b + d = a / c + s = p / q + r = q / p + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 12): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') / Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') / Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') / Symbol('q') + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Symbol('q') / Symbol('p') + ) + + def test_mul_binop(): + src1 = ( + src + + """\ + d = a + b - c + c = a * b + d + s = p * q / r + r = p * s + q / p + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 12): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('b') - Symbol('c') + ) + assert ls1[9] == Assignment( + Variable(Symbol('c')), + Symbol('a') * Symbol('b') + Symbol('d') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') * Symbol('q') / Symbol('r') + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Symbol('p') * Symbol('s') + Symbol('q') / Symbol('p') + ) + + + def test_function(): + src1 = """\ + integer function f(a,b) + integer :: x, y + f = x + y + end function + """ + expr1.convert_to_expr(src1, 'f') + for iter in expr1.return_expr(): + assert isinstance(iter, FunctionDefinition) + assert iter == FunctionDefinition( + IntBaseType(String('integer')), + name=String('f'), + parameters=( + Variable(Symbol('a')), + Variable(Symbol('b')) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('f'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Assignment( + Variable(Symbol('f')), + Add(Symbol('x'), Symbol('y')) + ), + Return(Variable(Symbol('f'))) + ) + ) + + + def test_var(): + expr1.convert_to_expr(src, 'f') + ls = expr1.return_expr() + for iter in expr1.return_expr(): + assert isinstance(iter, Declaration) + assert ls[0] == Declaration( + Variable( + Symbol('a'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[1] == Declaration( + Variable( + Symbol('b'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[2] == Declaration( + Variable( + Symbol('c'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[3] == Declaration( + Variable( + Symbol('d'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[4] == Declaration( + Variable( + Symbol('p'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[5] == Declaration( + Variable( + Symbol('q'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[6] == Declaration( + Variable( + Symbol('r'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[7] == Declaration( + Variable( + Symbol('s'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + +else: + def test_raise(): + from sympy.parsing.fortran.fortran_parser import ASR2PyVisitor + raises(ImportError, lambda: ASR2PyVisitor()) + raises(ImportError, lambda: SymPyExpression(' ', mode = 'f')) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py new file mode 100644 index 0000000000000000000000000000000000000000..56df361e77b0c0f94bdb53b03e0dc30a8a10899f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py @@ -0,0 +1,195 @@ +import sympy +from sympy.parsing.sympy_parser import ( + parse_expr, + standard_transformations, + convert_xor, + implicit_multiplication_application, + implicit_multiplication, + implicit_application, + function_exponentiation, + split_symbols, + split_symbols_custom, + _token_splittable +) +from sympy.testing.pytest import raises + + +def test_implicit_multiplication(): + cases = { + '5x': '5*x', + 'abc': 'a*b*c', + '3sin(x)': '3*sin(x)', + '(x+1)(x+2)': '(x+1)*(x+2)', + '(5 x**2)sin(x)': '(5*x**2)*sin(x)', + '2 sin(x) cos(x)': '2*sin(x)*cos(x)', + 'pi x': 'pi*x', + 'x pi': 'x*pi', + 'E x': 'E*x', + 'EulerGamma y': 'EulerGamma*y', + 'E pi': 'E*pi', + 'pi (x + 2)': 'pi*(x+2)', + '(x + 2) pi': '(x+2)*pi', + 'pi sin(x)': 'pi*sin(x)', + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (split_symbols, + implicit_multiplication) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + application = ['sin x', 'cos 2*x', 'sin cos x'] + for case in application: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + raises(TypeError, + lambda: parse_expr('sin**2(x)', transformations=transformations2)) + + +def test_implicit_application(): + cases = { + 'factorial': 'factorial', + 'sin x': 'sin(x)', + 'tan y**3': 'tan(y**3)', + 'cos 2*x': 'cos(2*x)', + '(cot)': 'cot', + 'sin cos tan x': 'sin(cos(tan(x)))' + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (implicit_application,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal), (implicit, normal) + + multiplication = ['x y', 'x sin x', '2x'] + for case in multiplication: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + raises(TypeError, + lambda: parse_expr('sin**2(x)', transformations=transformations2)) + + +def test_function_exponentiation(): + cases = { + 'sin**2(x)': 'sin(x)**2', + 'exp^y(z)': 'exp(z)^y', + 'sin**2(E^(x))': 'sin(E^(x))**2' + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (function_exponentiation,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + other_implicit = ['x y', 'x sin x', '2x', 'sin x', + 'cos 2*x', 'sin cos x'] + for case in other_implicit: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + + assert parse_expr('x**2', local_dict={ 'x': sympy.Symbol('x') }, + transformations=transformations2) == parse_expr('x**2') + + +def test_symbol_splitting(): + # By default Greek letter names should not be split (lambda is a keyword + # so skip it) + transformations = standard_transformations + (split_symbols,) + greek_letters = ('alpha', 'beta', 'gamma', 'delta', 'epsilon', 'zeta', + 'eta', 'theta', 'iota', 'kappa', 'mu', 'nu', 'xi', + 'omicron', 'pi', 'rho', 'sigma', 'tau', 'upsilon', + 'phi', 'chi', 'psi', 'omega') + + for letter in greek_letters: + assert(parse_expr(letter, transformations=transformations) == + parse_expr(letter)) + + # Make sure symbol splitting resolves names + transformations += (implicit_multiplication,) + local_dict = { 'e': sympy.E } + cases = { + 'xe': 'E*x', + 'Iy': 'I*y', + 'ee': 'E*E', + } + for case, expected in cases.items(): + assert(parse_expr(case, local_dict=local_dict, + transformations=transformations) == + parse_expr(expected)) + + # Make sure custom splitting works + def can_split(symbol): + if symbol not in ('unsplittable', 'names'): + return _token_splittable(symbol) + return False + transformations = standard_transformations + transformations += (split_symbols_custom(can_split), + implicit_multiplication) + + assert(parse_expr('unsplittable', transformations=transformations) == + parse_expr('unsplittable')) + assert(parse_expr('names', transformations=transformations) == + parse_expr('names')) + assert(parse_expr('xy', transformations=transformations) == + parse_expr('x*y')) + for letter in greek_letters: + assert(parse_expr(letter, transformations=transformations) == + parse_expr(letter)) + + +def test_all_implicit_steps(): + cases = { + '2x': '2*x', # implicit multiplication + 'x y': 'x*y', + 'xy': 'x*y', + 'sin x': 'sin(x)', # add parentheses + '2sin x': '2*sin(x)', + 'x y z': 'x*y*z', + 'sin(2 * 3x)': 'sin(2 * 3 * x)', + 'sin(x) (1 + cos(x))': 'sin(x) * (1 + cos(x))', + '(x + 2) sin(x)': '(x + 2) * sin(x)', + '(x + 2) sin x': '(x + 2) * sin(x)', + 'sin(sin x)': 'sin(sin(x))', + 'sin x!': 'sin(factorial(x))', + 'sin x!!': 'sin(factorial2(x))', + 'factorial': 'factorial', # don't apply a bare function + 'x sin x': 'x * sin(x)', # both application and multiplication + 'xy sin x': 'x * y * sin(x)', + '(x+2)(x+3)': '(x + 2) * (x+3)', + 'x**2 + 2xy + y**2': 'x**2 + 2 * x * y + y**2', # split the xy + 'pi': 'pi', # don't mess with constants + 'None': 'None', + 'ln sin x': 'ln(sin(x))', # multiple implicit function applications + 'sin x**2': 'sin(x**2)', # implicit application to an exponential + 'alpha': 'Symbol("alpha")', # don't split Greek letters/subscripts + 'x_2': 'Symbol("x_2")', + 'sin^2 x**2': 'sin(x**2)**2', # function raised to a power + 'sin**3(x)': 'sin(x)**3', + '(factorial)': 'factorial', + 'tan 3x': 'tan(3*x)', + 'sin^2(3*E^(x))': 'sin(3*E**(x))**2', + 'sin**2(E^(3x))': 'sin(E**(3*x))**2', + 'sin^2 (3x*E^(x))': 'sin(3*x*E^x)**2', + 'pi sin x': 'pi*sin(x)', + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (implicit_multiplication_application,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + +def test_no_methods_implicit_multiplication(): + # Issue 21020 + u = sympy.Symbol('u') + transformations = standard_transformations + \ + (implicit_multiplication,) + expr = parse_expr('x.is_polynomial(x)', transformations=transformations) + assert expr == True + expr = parse_expr('(exp(x) / (1 + exp(2x))).subs(exp(x), u)', + transformations=transformations) + assert expr == u/(u**2 + 1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py new file mode 100644 index 0000000000000000000000000000000000000000..49a48966eacaa1cd7a242dcd0e7699c992bb1268 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py @@ -0,0 +1,358 @@ +from sympy.testing.pytest import raises, XFAIL +from sympy.external import import_module + +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.function import (Derivative, Function) +from sympy.core.mul import Mul +from sympy.core.numbers import (E, oo) +from sympy.core.power import Pow +from sympy.core.relational import (GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality) +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import (binomial, factorial) +from sympy.functions.elementary.complexes import (Abs, conjugate) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (asin, cos, csc, sec, sin, tan) +from sympy.integrals.integrals import Integral +from sympy.series.limits import Limit + +from sympy.core.relational import Eq, Ne, Lt, Le, Gt, Ge +from sympy.physics.quantum.state import Bra, Ket +from sympy.abc import x, y, z, a, b, c, t, k, n +antlr4 = import_module("antlr4") + +# disable tests if antlr4-python3-runtime is not present +disabled = antlr4 is None + +theta = Symbol('theta') +f = Function('f') + + +# shorthand definitions +def _Add(a, b): + return Add(a, b, evaluate=False) + + +def _Mul(a, b): + return Mul(a, b, evaluate=False) + + +def _Pow(a, b): + return Pow(a, b, evaluate=False) + + +def _Sqrt(a): + return sqrt(a, evaluate=False) + + +def _Conjugate(a): + return conjugate(a, evaluate=False) + + +def _Abs(a): + return Abs(a, evaluate=False) + + +def _factorial(a): + return factorial(a, evaluate=False) + + +def _exp(a): + return exp(a, evaluate=False) + + +def _log(a, b): + return log(a, b, evaluate=False) + + +def _binomial(n, k): + return binomial(n, k, evaluate=False) + + +def test_import(): + from sympy.parsing.latex._build_latex_antlr import ( + build_parser, + check_antlr_version, + dir_latex_antlr + ) + # XXX: It would be better to come up with a test for these... + del build_parser, check_antlr_version, dir_latex_antlr + + +# These LaTeX strings should parse to the corresponding SymPy expression +GOOD_PAIRS = [ + (r"0", 0), + (r"1", 1), + (r"-3.14", -3.14), + (r"(-7.13)(1.5)", _Mul(-7.13, 1.5)), + (r"x", x), + (r"2x", 2*x), + (r"x^2", x**2), + (r"x^\frac{1}{2}", _Pow(x, _Pow(2, -1))), + (r"x^{3 + 1}", x**_Add(3, 1)), + (r"-c", -c), + (r"a \cdot b", a * b), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", _Add(a+b, -a)), + (r"a^2 + b^2 = c^2", Eq(a**2 + b**2, c**2)), + (r"(x + y) z", _Mul(_Add(x, y), z)), + (r"a'b+ab'", _Add(_Mul(Symbol("a'"), b), _Mul(a, Symbol("b'")))), + (r"y''_1", Symbol("y_{1}''")), + (r"y_1''", Symbol("y_{1}''")), + (r"\left(x + y\right) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left[x + y\right] z", _Mul(_Add(x, y), z)), + (r"\left\{x + y\right\} z", _Mul(_Add(x, y), z)), + (r"1+1", _Add(1, 1)), + (r"0+1", _Add(0, 1)), + (r"1*2", _Mul(1, 2)), + (r"0*1", _Mul(0, 1)), + (r"1 \times 2 ", _Mul(1, 2)), + (r"x = y", Eq(x, y)), + (r"x \neq y", Ne(x, y)), + (r"x < y", Lt(x, y)), + (r"x > y", Gt(x, y)), + (r"x \leq y", Le(x, y)), + (r"x \geq y", Ge(x, y)), + (r"x \le y", Le(x, y)), + (r"x \ge y", Ge(x, y)), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\sin \theta", sin(theta)), + (r"\sin(\theta)", sin(theta)), + (r"\sin^{-1} a", asin(a)), + (r"\sin a \cos b", _Mul(sin(a), cos(b))), + (r"\sin \cos \theta", sin(cos(theta))), + (r"\sin(\cos \theta)", sin(cos(theta))), + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", _Pow(2, -1)), + (r"\frac12y", _Mul(_Pow(2, -1), y)), + (r"\frac1234", _Mul(_Pow(2, -1), 34)), + (r"\frac2{3}", _Mul(2, _Pow(3, -1))), + (r"\frac{\sin{x}}2", _Mul(sin(x), _Pow(2, -1))), + (r"\frac{a + b}{c}", _Mul(a + b, _Pow(c, -1))), + (r"\frac{7}{3}", _Mul(7, _Pow(3, -1))), + (r"(\csc x)(\sec y)", csc(x)*sec(y)), + (r"\lim_{x \to 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \rightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \Rightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \longrightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \Longrightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \to 3^{+}} a", Limit(a, x, 3, dir='+')), + (r"\lim_{x \to 3^{-}} a", Limit(a, x, 3, dir='-')), + (r"\lim_{x \to 3^+} a", Limit(a, x, 3, dir='+')), + (r"\lim_{x \to 3^-} a", Limit(a, x, 3, dir='-')), + (r"\infty", oo), + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(_Pow(x, -1), x, oo)), + (r"\frac{d}{dx} x", Derivative(x, x)), + (r"\frac{d}{dt} x", Derivative(x, t)), + (r"f(x)", f(x)), + (r"f(x, y)", f(x, y)), + (r"f(x, y, z)", f(x, y, z)), + (r"f'_1(x)", Function("f_{1}'")(x)), + (r"f_{1}''(x+y)", Function("f_{1}''")(x+y)), + (r"\frac{d f(x)}{dx}", Derivative(f(x), x)), + (r"\frac{d\theta(x)}{dx}", Derivative(Function('theta')(x), x)), + (r"x \neq y", Unequality(x, y)), + (r"|x|", _Abs(x)), + (r"||x||", _Abs(Abs(x))), + (r"|x||y|", _Abs(x)*_Abs(y)), + (r"||x||y||", _Abs(_Abs(x)*_Abs(y))), + (r"\pi^{|xy|}", Symbol('pi')**_Abs(x*y)), + (r"\int x dx", Integral(x, x)), + (r"\int x d\theta", Integral(x, theta)), + (r"\int (x^2 - y)dx", Integral(x**2 - y, x)), + (r"\int x + a dx", Integral(_Add(x, a), x)), + (r"\int da", Integral(1, a)), + (r"\int_0^7 dx", Integral(1, (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(x, (x, 0, 1))), + (r"\int_a^b x dx", Integral(x, (x, a, b))), + (r"\int^b_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^b x dx", Integral(x, (x, a, b))), + (r"\int^{b}_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(x, (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(x, (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int (x+a)", Integral(_Add(x, a), x)), + (r"\int a + b + c dx", Integral(_Add(_Add(a, b), c), x)), + (r"\int \frac{dz}{z}", Integral(Pow(z, -1), z)), + (r"\int \frac{3 dz}{z}", Integral(3*Pow(z, -1), z)), + (r"\int \frac{1}{x} dx", Integral(Pow(x, -1), x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", + Integral(_Add(_Pow(a, -1), Pow(b, -1)), x)), + (r"\int \frac{3 \cdot d\theta}{\theta}", + Integral(3*_Pow(theta, -1), theta)), + (r"\int \frac{1}{x} + 1 dx", Integral(_Add(_Pow(x, -1), 1), x)), + (r"x_0", Symbol('x_{0}')), + (r"x_{1}", Symbol('x_{1}')), + (r"x_a", Symbol('x_{a}')), + (r"x_{b}", Symbol('x_{b}')), + (r"h_\theta", Symbol('h_{theta}')), + (r"h_{\theta}", Symbol('h_{theta}')), + (r"h_{\theta}(x_0, x_1)", + Function('h_{theta}')(Symbol('x_{0}'), Symbol('x_{1}'))), + (r"x!", _factorial(x)), + (r"100!", _factorial(100)), + (r"\theta!", _factorial(theta)), + (r"(x + 1)!", _factorial(_Add(x, 1))), + (r"(x!)!", _factorial(_factorial(x))), + (r"x!!!", _factorial(_factorial(_factorial(x)))), + (r"5!7!", _Mul(_factorial(5), _factorial(7))), + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(_Add(x, b))), + (r"\sqrt[3]{\sin x}", root(sin(x), 3)), + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", _Sqrt(_Mul(12, _Pow(6, -1)))), + (r"\overline{z}", _Conjugate(z)), + (r"\overline{\overline{z}}", _Conjugate(_Conjugate(z))), + (r"\overline{x + y}", _Conjugate(_Add(x, y))), + (r"\overline{x} + \overline{y}", _Conjugate(x) + _Conjugate(y)), + (r"x < y", StrictLessThan(x, y)), + (r"x \leq y", LessThan(x, y)), + (r"x > y", StrictGreaterThan(x, y)), + (r"x \geq y", GreaterThan(x, y)), + (r"\mathit{x}", Symbol('x')), + (r"\mathit{test}", Symbol('test')), + (r"\mathit{TEST}", Symbol('TEST')), + (r"\mathit{HELLO world}", Symbol('HELLO world')), + (r"\sum_{k = 1}^{3} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(c, (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(k**2, (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", + Sum(_Pow(_factorial(n), -1), (n, 0, oo))), + (r"\prod_{a = b}^{c} x", Product(x, (a, b, c))), + (r"\prod_{a = b}^c x", Product(x, (a, b, c))), + (r"\prod^{c}_{a = b} x", Product(x, (a, b, c))), + (r"\prod^c_{a = b} x", Product(x, (a, b, c))), + (r"\exp x", _exp(x)), + (r"\exp(x)", _exp(x)), + (r"\lg x", _log(x, 10)), + (r"\ln x", _log(x, E)), + (r"\ln xy", _log(x*y, E)), + (r"\log x", _log(x, E)), + (r"\log xy", _log(x*y, E)), + (r"\log_{2} x", _log(x, 2)), + (r"\log_{a} x", _log(x, a)), + (r"\log_{11} x", _log(x, 11)), + (r"\log_{a^2} x", _log(x, _Pow(a, 2))), + (r"[x]", x), + (r"[a + b]", _Add(a, b)), + (r"\frac{d}{dx} [ \tan x ]", Derivative(tan(x), x)), + (r"\binom{n}{k}", _binomial(n, k)), + (r"\tbinom{n}{k}", _binomial(n, k)), + (r"\dbinom{n}{k}", _binomial(n, k)), + (r"\binom{n}{0}", _binomial(n, 0)), + (r"x^\binom{n}{k}", _Pow(x, _binomial(n, k))), + (r"a \, b", _Mul(a, b)), + (r"a \thinspace b", _Mul(a, b)), + (r"a \: b", _Mul(a, b)), + (r"a \medspace b", _Mul(a, b)), + (r"a \; b", _Mul(a, b)), + (r"a \thickspace b", _Mul(a, b)), + (r"a \quad b", _Mul(a, b)), + (r"a \qquad b", _Mul(a, b)), + (r"a \! b", _Mul(a, b)), + (r"a \negthinspace b", _Mul(a, b)), + (r"a \negmedspace b", _Mul(a, b)), + (r"a \negthickspace b", _Mul(a, b)), + (r"\int x \, dx", Integral(x, x)), + (r"\log_2 x", _log(x, 2)), + (r"\log_a x", _log(x, a)), + (r"5^0 - 4^0", _Add(_Pow(5, 0), _Mul(-1, _Pow(4, 0)))), + (r"3x - 1", _Add(_Mul(3, x), -1)) +] + + +def test_parseable(): + from sympy.parsing.latex import parse_latex + for latex_str, sympy_expr in GOOD_PAIRS: + assert parse_latex(latex_str) == sympy_expr, latex_str + +# These bad LaTeX strings should raise a LaTeXParsingError when parsed +BAD_STRINGS = [ + r"(", + r")", + r"\frac{d}{dx}", + r"(\frac{d}{dx})", + r"\sqrt{}", + r"\sqrt", + r"\overline{}", + r"\overline", + r"{", + r"}", + r"\mathit{x + y}", + r"\mathit{21}", + r"\frac{2}{}", + r"\frac{}{2}", + r"\int", + r"!", + r"!0", + r"_", + r"^", + r"|", + r"||x|", + r"()", + r"((((((((((((((((()))))))))))))))))", + r"-", + r"\frac{d}{dx} + \frac{d}{dt}", + r"f(x,,y)", + r"f(x,y,", + r"\sin^x", + r"\cos^2", + r"@", + r"#", + r"$", + r"%", + r"&", + r"*", + r"" "\\", + r"~", + r"\frac{(2 + x}{1 - x)}", +] + +def test_not_parseable(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str) + +# At time of migration from latex2sympy, should fail but doesn't +FAILING_BAD_STRINGS = [ + r"\cos 1 \cos", + r"f(,", + r"f()", + r"a \div \div b", + r"a \cdot \cdot b", + r"a // b", + r"a +", + r"1.1.1", + r"1 +", + r"a / b /", +] + +@XFAIL +def test_failing_not_parseable(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in FAILING_BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str) + +# In strict mode, FAILING_BAD_STRINGS would fail +def test_strict_mode(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in FAILING_BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str, strict=True) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py new file mode 100644 index 0000000000000000000000000000000000000000..7df44c2b19e34024db6e898f7c4eac962dcaa1c9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py @@ -0,0 +1,16 @@ +from sympy.external import import_module +from sympy.testing.pytest import ignore_warnings, raises + +antlr4 = import_module("antlr4", warn_not_installed=False) + +# disable tests if antlr4-python3-runtime is not present +if antlr4: + disabled = True + + +def test_no_import(): + from sympy.parsing.latex import parse_latex + + with ignore_warnings(UserWarning): + with raises(ImportError): + parse_latex('1 + 1') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py new file mode 100644 index 0000000000000000000000000000000000000000..dd1f72a66c788ac41d923005ea988664d05a16c1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py @@ -0,0 +1,872 @@ +from sympy.testing.pytest import XFAIL +from sympy.parsing.latex.lark import parse_latex_lark +from sympy.external import import_module + +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.function import Derivative, Function +from sympy.core.numbers import E, oo, Rational +from sympy.core.power import Pow +from sympy.core.parameters import evaluate +from sympy.core.relational import GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import binomial, factorial +from sympy.functions.elementary.complexes import Abs, conjugate +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.integers import ceiling, floor +from sympy.functions.elementary.miscellaneous import root, sqrt, Min, Max +from sympy.functions.elementary.trigonometric import asin, cos, csc, sec, sin, tan +from sympy.integrals.integrals import Integral +from sympy.series.limits import Limit +from sympy import Matrix, MatAdd, MatMul, Transpose, Trace +from sympy import I + +from sympy.core.relational import Eq, Ne, Lt, Le, Gt, Ge +from sympy.physics.quantum import Bra, Ket, InnerProduct +from sympy.abc import x, y, z, a, b, c, d, t, k, n + +from .test_latex import theta, f, _Add, _Mul, _Pow, _Sqrt, _Conjugate, _Abs, _factorial, _exp, _binomial + +lark = import_module("lark") + +# disable tests if lark is not present +disabled = lark is None + +# shorthand definitions that are only needed for the Lark LaTeX parser +def _Min(*args): + return Min(*args, evaluate=False) + + +def _Max(*args): + return Max(*args, evaluate=False) + + +def _log(a, b=E): + if b == E: + return log(a, evaluate=False) + else: + return log(a, b, evaluate=False) + + +def _MatAdd(a, b): + return MatAdd(a, b, evaluate=False) + + +def _MatMul(a, b): + return MatMul(a, b, evaluate=False) + + +# These LaTeX strings should parse to the corresponding SymPy expression +SYMBOL_EXPRESSION_PAIRS = [ + (r"x_0", Symbol('x_{0}')), + (r"x_{1}", Symbol('x_{1}')), + (r"x_a", Symbol('x_{a}')), + (r"x_{b}", Symbol('x_{b}')), + (r"h_\theta", Symbol('h_{theta}')), + (r"h_{\theta}", Symbol('h_{theta}')), + (r"y''_1", Symbol("y''_{1}")), + (r"y_1''", Symbol("y_{1}''")), + (r"\mathit{x}", Symbol('x')), + (r"\mathit{test}", Symbol('test')), + (r"\mathit{TEST}", Symbol('TEST')), + (r"\mathit{HELLO world}", Symbol('HELLO world')), + (r"a'", Symbol("a'")), + (r"a''", Symbol("a''")), + (r"\alpha'", Symbol("alpha'")), + (r"\alpha''", Symbol("alpha''")), + (r"a_b", Symbol("a_{b}")), + (r"a_b'", Symbol("a_{b}'")), + (r"a'_b", Symbol("a'_{b}")), + (r"a'_b'", Symbol("a'_{b}'")), + (r"a_{b'}", Symbol("a_{b'}")), + (r"a_{b'}'", Symbol("a_{b'}'")), + (r"a'_{b'}", Symbol("a'_{b'}")), + (r"a'_{b'}'", Symbol("a'_{b'}'")), + (r"\mathit{foo}'", Symbol("foo'")), + (r"\mathit{foo'}", Symbol("foo'")), + (r"\mathit{foo'}'", Symbol("foo''")), + (r"a_b''", Symbol("a_{b}''")), + (r"a''_b", Symbol("a''_{b}")), + (r"a''_b'''", Symbol("a''_{b}'''")), + (r"a_{b''}", Symbol("a_{b''}")), + (r"a_{b''}''", Symbol("a_{b''}''")), + (r"a''_{b''}", Symbol("a''_{b''}")), + (r"a''_{b''}'''", Symbol("a''_{b''}'''")), + (r"\mathit{foo}''", Symbol("foo''")), + (r"\mathit{foo''}", Symbol("foo''")), + (r"\mathit{foo''}'''", Symbol("foo'''''")), + (r"a_\alpha", Symbol("a_{alpha}")), + (r"a_\alpha'", Symbol("a_{alpha}'")), + (r"a'_\alpha", Symbol("a'_{alpha}")), + (r"a'_\alpha'", Symbol("a'_{alpha}'")), + (r"a_{\alpha'}", Symbol("a_{alpha'}")), + (r"a_{\alpha'}'", Symbol("a_{alpha'}'")), + (r"a'_{\alpha'}", Symbol("a'_{alpha'}")), + (r"a'_{\alpha'}'", Symbol("a'_{alpha'}'")), + (r"a_\alpha''", Symbol("a_{alpha}''")), + (r"a''_\alpha", Symbol("a''_{alpha}")), + (r"a''_\alpha'''", Symbol("a''_{alpha}'''")), + (r"a_{\alpha''}", Symbol("a_{alpha''}")), + (r"a_{\alpha''}''", Symbol("a_{alpha''}''")), + (r"a''_{\alpha''}", Symbol("a''_{alpha''}")), + (r"a''_{\alpha''}'''", Symbol("a''_{alpha''}'''")), + (r"\alpha_b", Symbol("alpha_{b}")), + (r"\alpha_b'", Symbol("alpha_{b}'")), + (r"\alpha'_b", Symbol("alpha'_{b}")), + (r"\alpha'_b'", Symbol("alpha'_{b}'")), + (r"\alpha_{b'}", Symbol("alpha_{b'}")), + (r"\alpha_{b'}'", Symbol("alpha_{b'}'")), + (r"\alpha'_{b'}", Symbol("alpha'_{b'}")), + (r"\alpha'_{b'}'", Symbol("alpha'_{b'}'")), + (r"\alpha_b''", Symbol("alpha_{b}''")), + (r"\alpha''_b", Symbol("alpha''_{b}")), + (r"\alpha''_b'''", Symbol("alpha''_{b}'''")), + (r"\alpha_{b''}", Symbol("alpha_{b''}")), + (r"\alpha_{b''}''", Symbol("alpha_{b''}''")), + (r"\alpha''_{b''}", Symbol("alpha''_{b''}")), + (r"\alpha''_{b''}'''", Symbol("alpha''_{b''}'''")), + (r"\alpha_\beta", Symbol("alpha_{beta}")), + (r"\alpha_{\beta}", Symbol("alpha_{beta}")), + (r"\alpha_{\beta'}", Symbol("alpha_{beta'}")), + (r"\alpha_{\beta''}", Symbol("alpha_{beta''}")), + (r"\alpha'_\beta", Symbol("alpha'_{beta}")), + (r"\alpha'_{\beta}", Symbol("alpha'_{beta}")), + (r"\alpha'_{\beta'}", Symbol("alpha'_{beta'}")), + (r"\alpha'_{\beta''}", Symbol("alpha'_{beta''}")), + (r"\alpha''_\beta", Symbol("alpha''_{beta}")), + (r"\alpha''_{\beta}", Symbol("alpha''_{beta}")), + (r"\alpha''_{\beta'}", Symbol("alpha''_{beta'}")), + (r"\alpha''_{\beta''}", Symbol("alpha''_{beta''}")), + (r"\alpha_\beta'", Symbol("alpha_{beta}'")), + (r"\alpha_{\beta}'", Symbol("alpha_{beta}'")), + (r"\alpha_{\beta'}'", Symbol("alpha_{beta'}'")), + (r"\alpha_{\beta''}'", Symbol("alpha_{beta''}'")), + (r"\alpha'_\beta'", Symbol("alpha'_{beta}'")), + (r"\alpha'_{\beta}'", Symbol("alpha'_{beta}'")), + (r"\alpha'_{\beta'}'", Symbol("alpha'_{beta'}'")), + (r"\alpha'_{\beta''}'", Symbol("alpha'_{beta''}'")), + (r"\alpha''_\beta'", Symbol("alpha''_{beta}'")), + (r"\alpha''_{\beta}'", Symbol("alpha''_{beta}'")), + (r"\alpha''_{\beta'}'", Symbol("alpha''_{beta'}'")), + (r"\alpha''_{\beta''}'", Symbol("alpha''_{beta''}'")), + (r"\alpha_\beta''", Symbol("alpha_{beta}''")), + (r"\alpha_{\beta}''", Symbol("alpha_{beta}''")), + (r"\alpha_{\beta'}''", Symbol("alpha_{beta'}''")), + (r"\alpha_{\beta''}''", Symbol("alpha_{beta''}''")), + (r"\alpha'_\beta''", Symbol("alpha'_{beta}''")), + (r"\alpha'_{\beta}''", Symbol("alpha'_{beta}''")), + (r"\alpha'_{\beta'}''", Symbol("alpha'_{beta'}''")), + (r"\alpha'_{\beta''}''", Symbol("alpha'_{beta''}''")), + (r"\alpha''_\beta''", Symbol("alpha''_{beta}''")), + (r"\alpha''_{\beta}''", Symbol("alpha''_{beta}''")), + (r"\alpha''_{\beta'}''", Symbol("alpha''_{beta'}''")), + (r"\alpha''_{\beta''}''", Symbol("alpha''_{beta''}''")) + +] + +UNEVALUATED_SIMPLE_EXPRESSION_PAIRS = [ + (r"0", 0), + (r"1", 1), + (r"-3.14", -3.14), + (r"(-7.13)(1.5)", _Mul(-7.13, 1.5)), + (r"1+1", _Add(1, 1)), + (r"0+1", _Add(0, 1)), + (r"1*2", _Mul(1, 2)), + (r"0*1", _Mul(0, 1)), + (r"x", x), + (r"2x", 2 * x), + (r"3x - 1", _Add(_Mul(3, x), -1)), + (r"-c", -c), + (r"\infty", oo), + (r"a \cdot b", a * b), + (r"1 \times 2 ", _Mul(1, 2)), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", _Add(a + b, -a)), + (r"(x + y) z", _Mul(_Add(x, y), z)), + (r"a'b+ab'", _Add(_Mul(Symbol("a'"), b), _Mul(a, Symbol("b'")))) +] + +EVALUATED_SIMPLE_EXPRESSION_PAIRS = [ + (r"(-7.13)(1.5)", -10.695), + (r"1+1", 2), + (r"0+1", 1), + (r"1*2", 2), + (r"0*1", 0), + (r"2x", 2 * x), + (r"3x - 1", 3 * x - 1), + (r"-c", -c), + (r"a \cdot b", a * b), + (r"1 \times 2 ", 2), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", b), + (r"(x + y) z", (x + y) * z), +] + +UNEVALUATED_FRACTION_EXPRESSION_PAIRS = [ + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", _Mul(1, _Pow(2, -1))), + (r"\frac12y", _Mul(_Mul(1, _Pow(2, -1)), y)), + (r"\frac1234", _Mul(_Mul(1, _Pow(2, -1)), 34)), + (r"\frac2{3}", _Mul(2, _Pow(3, -1))), + (r"\frac{a + b}{c}", _Mul(a + b, _Pow(c, -1))), + (r"\frac{7}{3}", _Mul(7, _Pow(3, -1))) +] + +EVALUATED_FRACTION_EXPRESSION_PAIRS = [ + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", Rational(1, 2)), + (r"\frac12y", y / 2), + (r"\frac1234", 17), + (r"\frac2{3}", Rational(2, 3)), + (r"\frac{a + b}{c}", (a + b) / c), + (r"\frac{7}{3}", Rational(7, 3)) +] + +RELATION_EXPRESSION_PAIRS = [ + (r"x = y", Eq(x, y)), + (r"x \neq y", Ne(x, y)), + (r"x < y", Lt(x, y)), + (r"x > y", Gt(x, y)), + (r"x \leq y", Le(x, y)), + (r"x \geq y", Ge(x, y)), + (r"x \le y", Le(x, y)), + (r"x \ge y", Ge(x, y)), + (r"x < y", StrictLessThan(x, y)), + (r"x \leq y", LessThan(x, y)), + (r"x > y", StrictGreaterThan(x, y)), + (r"x \geq y", GreaterThan(x, y)), + (r"x \neq y", Unequality(x, y)), # same as 2nd one in the list + (r"a^2 + b^2 = c^2", Eq(a**2 + b**2, c**2)) +] + +UNEVALUATED_POWER_EXPRESSION_PAIRS = [ + (r"x^2", x ** 2), + (r"x^\frac{1}{2}", _Pow(x, _Mul(1, _Pow(2, -1)))), + (r"x^{3 + 1}", x ** _Add(3, 1)), + (r"\pi^{|xy|}", Symbol('pi') ** _Abs(x * y)), + (r"5^0 - 4^0", _Add(_Pow(5, 0), _Mul(-1, _Pow(4, 0)))) +] + +EVALUATED_POWER_EXPRESSION_PAIRS = [ + (r"x^2", x ** 2), + (r"x^\frac{1}{2}", sqrt(x)), + (r"x^{3 + 1}", x ** 4), + (r"\pi^{|xy|}", Symbol('pi') ** _Abs(x * y)), + (r"5^0 - 4^0", 0) +] + +UNEVALUATED_INTEGRAL_EXPRESSION_PAIRS = [ + (r"\int x dx", Integral(_Mul(1, x), x)), + (r"\int x \, dx", Integral(_Mul(1, x), x)), + (r"\int x d\theta", Integral(_Mul(1, x), theta)), + (r"\int (x^2 - y)dx", Integral(_Mul(1, x ** 2 - y), x)), + (r"\int x + a dx", Integral(_Mul(1, _Add(x, a)), x)), + (r"\int da", Integral(_Mul(1, 1), a)), + (r"\int_0^7 dx", Integral(_Mul(1, 1), (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(_Mul(1, x), (x, 0, 1))), + (r"\int_a^b x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^b_a x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{a}^b x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^{b}_a x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int a + b + c dx", Integral(_Mul(1, _Add(_Add(a, b), c)), x)), + (r"\int \frac{dz}{z}", Integral(_Mul(1, _Mul(1, Pow(z, -1))), z)), + (r"\int \frac{3 dz}{z}", Integral(_Mul(1, _Mul(3, _Pow(z, -1))), z)), + (r"\int \frac{1}{x} dx", Integral(_Mul(1, _Mul(1, Pow(x, -1))), x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", + Integral(_Mul(1, _Add(_Mul(1, _Pow(a, -1)), _Mul(1, Pow(b, -1)))), x)), + (r"\int \frac{1}{x} + 1 dx", Integral(_Mul(1, _Add(_Mul(1, _Pow(x, -1)), 1)), x)) +] + +EVALUATED_INTEGRAL_EXPRESSION_PAIRS = [ + (r"\int x dx", Integral(x, x)), + (r"\int x \, dx", Integral(x, x)), + (r"\int x d\theta", Integral(x, theta)), + (r"\int (x^2 - y)dx", Integral(x ** 2 - y, x)), + (r"\int x + a dx", Integral(x + a, x)), + (r"\int da", Integral(1, a)), + (r"\int_0^7 dx", Integral(1, (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(x, (x, 0, 1))), + (r"\int_a^b x dx", Integral(x, (x, a, b))), + (r"\int^b_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^b x dx", Integral(x, (x, a, b))), + (r"\int^{b}_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(x, (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(x, (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int a + b + c dx", Integral(a + b + c, x)), + (r"\int \frac{dz}{z}", Integral(Pow(z, -1), z)), + (r"\int \frac{3 dz}{z}", Integral(3 * Pow(z, -1), z)), + (r"\int \frac{1}{x} dx", Integral(1 / x, x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", Integral(1 / a + 1 / b, x)), + (r"\int \frac{1}{a} - \frac{1}{b} dx", Integral(1 / a - 1 / b, x)), + (r"\int \frac{1}{x} + 1 dx", Integral(1 / x + 1, x)) +] + +DERIVATIVE_EXPRESSION_PAIRS = [ + (r"\frac{d}{dx} x", Derivative(x, x)), + (r"\frac{d}{dt} x", Derivative(x, t)), + (r"\frac{d}{dx} ( \tan x )", Derivative(tan(x), x)), + (r"\frac{d f(x)}{dx}", Derivative(f(x), x)), + (r"\frac{d\theta(x)}{dx}", Derivative(Function('theta')(x), x)) +] + +TRIGONOMETRIC_EXPRESSION_PAIRS = [ + (r"\sin \theta", sin(theta)), + (r"\sin(\theta)", sin(theta)), + (r"\sin^{-1} a", asin(a)), + (r"\sin a \cos b", _Mul(sin(a), cos(b))), + (r"\sin \cos \theta", sin(cos(theta))), + (r"\sin(\cos \theta)", sin(cos(theta))), + (r"(\csc x)(\sec y)", csc(x) * sec(y)), + (r"\frac{\sin{x}}2", _Mul(sin(x), _Pow(2, -1))) +] + +UNEVALUATED_LIMIT_EXPRESSION_PAIRS = [ + (r"\lim_{x \to 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \rightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \Rightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \longrightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \Longrightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \to 3^{+}} a", Limit(a, x, 3, dir="+")), + (r"\lim_{x \to 3^{-}} a", Limit(a, x, 3, dir="-")), + (r"\lim_{x \to 3^+} a", Limit(a, x, 3, dir="+")), + (r"\lim_{x \to 3^-} a", Limit(a, x, 3, dir="-")), + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(_Mul(1, _Pow(x, -1)), x, oo)) +] + +EVALUATED_LIMIT_EXPRESSION_PAIRS = [ + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(1 / x, x, oo)) +] + +UNEVALUATED_SQRT_EXPRESSION_PAIRS = [ + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(_Add(x, b))), + (r"\sqrt[3]{\sin x}", _Pow(sin(x), _Pow(3, -1))), + # the above test needed to be handled differently than the ones below because root + # acts differently if its second argument is a number + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", _Sqrt(_Mul(12, _Pow(6, -1)))) +] + +EVALUATED_SQRT_EXPRESSION_PAIRS = [ + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(x + b)), + (r"\sqrt[3]{\sin x}", root(sin(x), 3)), + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", sqrt(2)) +] + +UNEVALUATED_FACTORIAL_EXPRESSION_PAIRS = [ + (r"x!", _factorial(x)), + (r"100!", _factorial(100)), + (r"\theta!", _factorial(theta)), + (r"(x + 1)!", _factorial(_Add(x, 1))), + (r"(x!)!", _factorial(_factorial(x))), + (r"x!!!", _factorial(_factorial(_factorial(x)))), + (r"5!7!", _Mul(_factorial(5), _factorial(7))) +] + +EVALUATED_FACTORIAL_EXPRESSION_PAIRS = [ + (r"x!", factorial(x)), + (r"100!", factorial(100)), + (r"\theta!", factorial(theta)), + (r"(x + 1)!", factorial(x + 1)), + (r"(x!)!", factorial(factorial(x))), + (r"x!!!", factorial(factorial(factorial(x)))), + (r"5!7!", factorial(5) * factorial(7)), + (r"24! \times 24!", factorial(24) * factorial(24)) +] + +UNEVALUATED_SUM_EXPRESSION_PAIRS = [ + (r"\sum_{k = 1}^{3} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(_Mul(1, k ** 2), (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", + Sum(_Mul(1, _Mul(1, _Pow(_factorial(n), -1))), (n, 0, oo))) +] + +EVALUATED_SUM_EXPRESSION_PAIRS = [ + (r"\sum_{k = 1}^{3} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(c, (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(k ** 2, (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", Sum(1 / factorial(n), (n, 0, oo))) +] + +UNEVALUATED_PRODUCT_EXPRESSION_PAIRS = [ + (r"\prod_{a = b}^{c} x", Product(x, (a, b, c))), + (r"\prod_{a = b}^c x", Product(x, (a, b, c))), + (r"\prod^{c}_{a = b} x", Product(x, (a, b, c))), + (r"\prod^c_{a = b} x", Product(x, (a, b, c))) +] + +APPLIED_FUNCTION_EXPRESSION_PAIRS = [ + (r"f(x)", f(x)), + (r"f(x, y)", f(x, y)), + (r"f(x, y, z)", f(x, y, z)), + (r"f'_1(x)", Function("f_{1}'")(x)), + (r"f_{1}''(x+y)", Function("f_{1}''")(x + y)), + (r"h_{\theta}(x_0, x_1)", + Function('h_{theta}')(Symbol('x_{0}'), Symbol('x_{1}'))) +] + +UNEVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS = [ + (r"|x|", _Abs(x)), + (r"||x||", _Abs(Abs(x))), + (r"|x||y|", _Abs(x) * _Abs(y)), + (r"||x||y||", _Abs(_Abs(x) * _Abs(y))), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\exp x", _exp(x)), + (r"\exp(x)", _exp(x)), + (r"\lg x", _log(x, 10)), + (r"\ln x", _log(x)), + (r"\ln xy", _log(x * y)), + (r"\log x", _log(x)), + (r"\log xy", _log(x * y)), + (r"\log_{2} x", _log(x, 2)), + (r"\log_{a} x", _log(x, a)), + (r"\log_{11} x", _log(x, 11)), + (r"\log_{a^2} x", _log(x, _Pow(a, 2))), + (r"\log_2 x", _log(x, 2)), + (r"\log_a x", _log(x, a)), + (r"\overline{z}", _Conjugate(z)), + (r"\overline{\overline{z}}", _Conjugate(_Conjugate(z))), + (r"\overline{x + y}", _Conjugate(_Add(x, y))), + (r"\overline{x} + \overline{y}", _Conjugate(x) + _Conjugate(y)), + (r"\min(a, b)", _Min(a, b)), + (r"\min(a, b, c - d, xy)", _Min(a, b, c - d, x * y)), + (r"\max(a, b)", _Max(a, b)), + (r"\max(a, b, c - d, xy)", _Max(a, b, c - d, x * y)), + # physics things don't have an `evaluate=False` variant + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\langle x | y \rangle", InnerProduct(Bra('x'), Ket('y'))), +] + +EVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS = [ + (r"|x|", Abs(x)), + (r"||x||", Abs(Abs(x))), + (r"|x||y|", Abs(x) * Abs(y)), + (r"||x||y||", Abs(Abs(x) * Abs(y))), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\exp x", exp(x)), + (r"\exp(x)", exp(x)), + (r"\lg x", log(x, 10)), + (r"\ln x", log(x)), + (r"\ln xy", log(x * y)), + (r"\log x", log(x)), + (r"\log xy", log(x * y)), + (r"\log_{2} x", log(x, 2)), + (r"\log_{a} x", log(x, a)), + (r"\log_{11} x", log(x, 11)), + (r"\log_{a^2} x", log(x, _Pow(a, 2))), + (r"\log_2 x", log(x, 2)), + (r"\log_a x", log(x, a)), + (r"\overline{z}", conjugate(z)), + (r"\overline{\overline{z}}", conjugate(conjugate(z))), + (r"\overline{x + y}", conjugate(x + y)), + (r"\overline{x} + \overline{y}", conjugate(x) + conjugate(y)), + (r"\min(a, b)", Min(a, b)), + (r"\min(a, b, c - d, xy)", Min(a, b, c - d, x * y)), + (r"\max(a, b)", Max(a, b)), + (r"\max(a, b, c - d, xy)", Max(a, b, c - d, x * y)), + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\langle x | y \rangle", InnerProduct(Bra('x'), Ket('y'))), +] + +SPACING_RELATED_EXPRESSION_PAIRS = [ + (r"a \, b", _Mul(a, b)), + (r"a \thinspace b", _Mul(a, b)), + (r"a \: b", _Mul(a, b)), + (r"a \medspace b", _Mul(a, b)), + (r"a \; b", _Mul(a, b)), + (r"a \thickspace b", _Mul(a, b)), + (r"a \quad b", _Mul(a, b)), + (r"a \qquad b", _Mul(a, b)), + (r"a \! b", _Mul(a, b)), + (r"a \negthinspace b", _Mul(a, b)), + (r"a \negmedspace b", _Mul(a, b)), + (r"a \negthickspace b", _Mul(a, b)) +] + +UNEVALUATED_BINOMIAL_EXPRESSION_PAIRS = [ + (r"\binom{n}{k}", _binomial(n, k)), + (r"\tbinom{n}{k}", _binomial(n, k)), + (r"\dbinom{n}{k}", _binomial(n, k)), + (r"\binom{n}{0}", _binomial(n, 0)), + (r"x^\binom{n}{k}", _Pow(x, _binomial(n, k))) +] + +EVALUATED_BINOMIAL_EXPRESSION_PAIRS = [ + (r"\binom{n}{k}", binomial(n, k)), + (r"\tbinom{n}{k}", binomial(n, k)), + (r"\dbinom{n}{k}", binomial(n, k)), + (r"\binom{n}{0}", binomial(n, 0)), + (r"x^\binom{n}{k}", x ** binomial(n, k)) +] + +MISCELLANEOUS_EXPRESSION_PAIRS = [ + (r"\left(x + y\right) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), +] + +UNEVALUATED_LITERAL_COMPLEX_NUMBER_EXPRESSION_PAIRS = [ + (r"\imaginaryunit^2", _Pow(I, 2)), + (r"|\imaginaryunit|", _Abs(I)), + (r"\overline{\imaginaryunit}", _Conjugate(I)), + (r"\imaginaryunit+\imaginaryunit", _Add(I, I)), + (r"\imaginaryunit-\imaginaryunit", _Add(I, -I)), + (r"\imaginaryunit*\imaginaryunit", _Mul(I, I)), + (r"\imaginaryunit/\imaginaryunit", _Mul(I, _Pow(I, -1))), + (r"(1+\imaginaryunit)/|1+\imaginaryunit|", _Mul(_Add(1, I), _Pow(_Abs(_Add(1, I)), -1))) +] + +UNEVALUATED_MATRIX_EXPRESSION_PAIRS = [ + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}", + Matrix([[a, b], [x, y]])), + (r"\begin{pmatrix}a & b \\x & y\\\end{pmatrix}", + Matrix([[a, b], [x, y]])), + (r"\begin{bmatrix}a & b \\x & y\end{bmatrix}", + Matrix([[a, b], [x, y]])), + (r"\left(\begin{matrix}a & b \\x & y\end{matrix}\right)", + Matrix([[a, b], [x, y]])), + (r"\left[\begin{matrix}a & b \\x & y\end{matrix}\right]", + Matrix([[a, b], [x, y]])), + (r"\left[\begin{array}{cc}a & b \\x & y\end{array}\right]", + Matrix([[a, b], [x, y]])), + (r"\left(\begin{array}{cc}a & b \\x & y\end{array}\right)", + Matrix([[a, b], [x, y]])), + (r"\left( { \begin{array}{cc}a & b \\x & y\end{array} } \right)", + Matrix([[a, b], [x, y]])), + (r"+\begin{pmatrix}a & b \\x & y\end{pmatrix}", + Matrix([[a, b], [x, y]])), + ((r"\begin{pmatrix}x & y \\a & b\end{pmatrix}+" + r"\begin{pmatrix}a & b \\x & y\end{pmatrix}"), + _MatAdd(Matrix([[x, y], [a, b]]), Matrix([[a, b], [x, y]]))), + (r"-\begin{pmatrix}a & b \\x & y\end{pmatrix}", + _MatMul(-1, Matrix([[a, b], [x, y]]))), + ((r"\begin{pmatrix}x & y \\a & b\end{pmatrix}-" + r"\begin{pmatrix}a & b \\x & y\end{pmatrix}"), + _MatAdd(Matrix([[x, y], [a, b]]), _MatMul(-1, Matrix([[a, b], [x, y]])))), + ((r"\begin{pmatrix}a & b & c \\x & y & z \\a & b & c \end{pmatrix}*" + r"\begin{pmatrix}x & y & z \\a & b & c \\a & b & c \end{pmatrix}*" + r"\begin{pmatrix}a & b & c \\x & y & z \\x & y & z \end{pmatrix}"), + _MatMul(_MatMul(Matrix([[a, b, c], [x, y, z], [a, b, c]]), + Matrix([[x, y, z], [a, b, c], [a, b, c]])), + Matrix([[a, b, c], [x, y, z], [x, y, z]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/2", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(2, -1))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^2", + _Pow(Matrix([[a, b], [x, y]]), 2)), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^{-1}", + _Pow(Matrix([[a, b], [x, y]]), -1)), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^T", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^{T}", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^\mathit{T}", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}^T", + Transpose(Matrix([[1, 2], [3, 4]]))), + ((r"(\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}+" + r"\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}^T)*" + r"\begin{bmatrix}1\\0\end{bmatrix}"), + _MatMul(_MatAdd(Matrix([[1, 2], [3, 4]]), + Transpose(Matrix([[1, 2], [3, 4]]))), + Matrix([[1], [0]]))), + ((r"(\begin{pmatrix}a & b \\x & y\end{pmatrix}+" + r"\begin{pmatrix}x & y \\a & b\end{pmatrix})^2"), + _Pow(_MatAdd(Matrix([[a, b], [x, y]]), + Matrix([[x, y], [a, b]])), 2)), + ((r"(\begin{pmatrix}a & b \\x & y\end{pmatrix}+" + r"\begin{pmatrix}x & y \\a & b\end{pmatrix})^T"), + Transpose(_MatAdd(Matrix([[a, b], [x, y]]), + Matrix([[x, y], [a, b]])))), + (r"\overline{\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}}", + _Conjugate(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))) +] + +EVALUATED_MATRIX_EXPRESSION_PAIRS = [ + (r"\det\left(\left[ { \begin{array}{cc}a&b\\x&y\end{array} } \right]\right)", + Matrix([[a, b], [x, y]]).det()), + (r"\det \begin{pmatrix}1&2\\3&4\end{pmatrix}", -2), + (r"\det{\begin{pmatrix}1&2\\3&4\end{pmatrix}}", -2), + (r"\det(\begin{pmatrix}1&2\\3&4\end{pmatrix})", -2), + (r"\det\left(\begin{pmatrix}1&2\\3&4\end{pmatrix}\right)", -2), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/\begin{vmatrix}a & b \\x & y\end{vmatrix}", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/|\begin{matrix}a & b \\x & y\end{matrix}|", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\frac{\begin{pmatrix}a & b \\x & y\end{pmatrix}}{| { \begin{matrix}a & b \\x & y\end{matrix} } |}", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\overline{\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix}}", + Matrix([[-I, 1-I], [I, 4]])), + (r"\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix}^H", + Matrix([[-I, I], [1-I, 4]])), + (r"\trace(\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix})", + Trace(Matrix([[I, 1+I], [-I, 4]]))), + (r"\adjugate(\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix})", + Matrix([[4, -2], [-3, 1]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^\ast", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast\ast}", + Matrix([[2*I, 4], [6, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast\ast\ast}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{*}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{**}", + Matrix([[2*I, 4], [6, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{***}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^\prime", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime\prime}", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime\prime\prime}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{'}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{''}", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{'''}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})'", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})''", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})'''", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"\det(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + (_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))).det()), + (r"\trace(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + Trace(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"\adjugate(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + (Matrix([[8, -4], [-6, 2*I]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^T", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^H", + (Matrix([[-2*I, 6], [4, 8]]))) +] + + +def test_symbol_expressions(): + expected_failures = {6, 7} + for i, (latex_str, sympy_expr) in enumerate(SYMBOL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_simple_expressions(): + expected_failures = {20} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_SIMPLE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_SIMPLE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_fraction_expressions(): + for latex_str, sympy_expr in UNEVALUATED_FRACTION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_FRACTION_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_relation_expressions(): + for latex_str, sympy_expr in RELATION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + +def test_power_expressions(): + expected_failures = {3} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_POWER_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_POWER_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_integral_expressions(): + expected_failures = {14} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_INTEGRAL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, i + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_INTEGRAL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_derivative_expressions(): + expected_failures = {3, 4} + for i, (latex_str, sympy_expr) in enumerate(DERIVATIVE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(DERIVATIVE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_trigonometric_expressions(): + expected_failures = {3} + for i, (latex_str, sympy_expr) in enumerate(TRIGONOMETRIC_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_limit_expressions(): + for latex_str, sympy_expr in UNEVALUATED_LIMIT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_square_root_expressions(): + for latex_str, sympy_expr in UNEVALUATED_SQRT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_SQRT_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_factorial_expressions(): + for latex_str, sympy_expr in UNEVALUATED_FACTORIAL_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_FACTORIAL_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_sum_expressions(): + for latex_str, sympy_expr in UNEVALUATED_SUM_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_SUM_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_product_expressions(): + for latex_str, sympy_expr in UNEVALUATED_PRODUCT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + +@XFAIL +def test_applied_function_expressions(): + expected_failures = {0, 3, 4} # 0 is ambiguous, and the others require not-yet-added features + # not sure why 1, and 2 are failing + for i, (latex_str, sympy_expr) in enumerate(APPLIED_FUNCTION_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_common_function_expressions(): + for latex_str, sympy_expr in UNEVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +# unhandled bug causing these to fail +@XFAIL +def test_spacing(): + for latex_str, sympy_expr in SPACING_RELATED_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_binomial_expressions(): + for latex_str, sympy_expr in UNEVALUATED_BINOMIAL_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_BINOMIAL_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_miscellaneous_expressions(): + for latex_str, sympy_expr in MISCELLANEOUS_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_literal_complex_number_expressions(): + for latex_str, sympy_expr in UNEVALUATED_LITERAL_COMPLEX_NUMBER_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_matrix_expressions(): + for latex_str, sympy_expr in UNEVALUATED_MATRIX_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_MATRIX_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_mathematica.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_mathematica.py new file mode 100644 index 0000000000000000000000000000000000000000..df193b6d61f9c82778d8e0a40b893cbe6cb8f06a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_mathematica.py @@ -0,0 +1,280 @@ +from sympy import sin, Function, symbols, Dummy, Lambda, cos +from sympy.parsing.mathematica import parse_mathematica, MathematicaParser +from sympy.core.sympify import sympify +from sympy.abc import n, w, x, y, z +from sympy.testing.pytest import raises + + +def test_mathematica(): + d = { + '- 6x': '-6*x', + 'Sin[x]^2': 'sin(x)**2', + '2(x-1)': '2*(x-1)', + '3y+8': '3*y+8', + 'ArcSin[2x+9(4-x)^2]/x': 'asin(2*x+9*(4-x)**2)/x', + 'x+y': 'x+y', + '355/113': '355/113', + '2.718281828': '2.718281828', + 'Cos(1/2 * π)': 'Cos(π/2)', + 'Sin[12]': 'sin(12)', + 'Exp[Log[4]]': 'exp(log(4))', + '(x+1)(x+3)': '(x+1)*(x+3)', + 'Cos[ArcCos[3.6]]': 'cos(acos(3.6))', + 'Cos[x]==Sin[y]': 'Eq(cos(x), sin(y))', + '2*Sin[x+y]': '2*sin(x+y)', + 'Sin[x]+Cos[y]': 'sin(x)+cos(y)', + 'Sin[Cos[x]]': 'sin(cos(x))', + '2*Sqrt[x+y]': '2*sqrt(x+y)', # Test case from the issue 4259 + '+Sqrt[2]': 'sqrt(2)', + '-Sqrt[2]': '-sqrt(2)', + '-1/Sqrt[2]': '-1/sqrt(2)', + '-(1/Sqrt[3])': '-(1/sqrt(3))', + '1/(2*Sqrt[5])': '1/(2*sqrt(5))', + 'Mod[5,3]': 'Mod(5,3)', + '-Mod[5,3]': '-Mod(5,3)', + '(x+1)y': '(x+1)*y', + 'x(y+1)': 'x*(y+1)', + 'Sin[x]Cos[y]': 'sin(x)*cos(y)', + 'Sin[x]^2Cos[y]^2': 'sin(x)**2*cos(y)**2', + 'Cos[x]^2(1 - Cos[y]^2)': 'cos(x)**2*(1-cos(y)**2)', + 'x y': 'x*y', + 'x y': 'x*y', + '2 x': '2*x', + 'x 8': 'x*8', + '2 8': '2*8', + '4.x': '4.*x', + '4. 3': '4.*3', + '4. 3.': '4.*3.', + '1 2 3': '1*2*3', + ' - 2 * Sqrt[ 2 3 * ( 1 + 5 ) ] ': '-2*sqrt(2*3*(1+5))', + 'Log[2,4]': 'log(4,2)', + 'Log[Log[2,4],4]': 'log(4,log(4,2))', + 'Exp[Sqrt[2]^2Log[2, 8]]': 'exp(sqrt(2)**2*log(8,2))', + 'ArcSin[Cos[0]]': 'asin(cos(0))', + 'Log2[16]': 'log(16,2)', + 'Max[1,-2,3,-4]': 'Max(1,-2,3,-4)', + 'Min[1,-2,3]': 'Min(1,-2,3)', + 'Exp[I Pi/2]': 'exp(I*pi/2)', + 'ArcTan[x,y]': 'atan2(y,x)', + 'Pochhammer[x,y]': 'rf(x,y)', + 'ExpIntegralEi[x]': 'Ei(x)', + 'SinIntegral[x]': 'Si(x)', + 'CosIntegral[x]': 'Ci(x)', + 'AiryAi[x]': 'airyai(x)', + 'AiryAiPrime[5]': 'airyaiprime(5)', + 'AiryBi[x]': 'airybi(x)', + 'AiryBiPrime[7]': 'airybiprime(7)', + 'LogIntegral[4]': ' li(4)', + 'PrimePi[7]': 'primepi(7)', + 'Prime[5]': 'prime(5)', + 'PrimeQ[5]': 'isprime(5)', + 'Rational[2,19]': 'Rational(2,19)', # test case for issue 25716 + } + + for e in d: + assert parse_mathematica(e) == sympify(d[e]) + + # The parsed form of this expression should not evaluate the Lambda object: + assert parse_mathematica("Sin[#]^2 + Cos[#]^2 &[x]") == sin(x)**2 + cos(x)**2 + + d1, d2, d3 = symbols("d1:4", cls=Dummy) + assert parse_mathematica("Sin[#] + Cos[#3] &").dummy_eq(Lambda((d1, d2, d3), sin(d1) + cos(d3))) + assert parse_mathematica("Sin[#^2] &").dummy_eq(Lambda(d1, sin(d1**2))) + assert parse_mathematica("Function[x, x^3]") == Lambda(x, x**3) + assert parse_mathematica("Function[{x, y}, x^2 + y^2]") == Lambda((x, y), x**2 + y**2) + + +def test_parser_mathematica_tokenizer(): + parser = MathematicaParser() + + chain = lambda expr: parser._from_tokens_to_fullformlist(parser._from_mathematica_to_tokens(expr)) + + # Basic patterns + assert chain("x") == "x" + assert chain("42") == "42" + assert chain(".2") == ".2" + assert chain("+x") == "x" + assert chain("-1") == "-1" + assert chain("- 3") == "-3" + assert chain("α") == "α" + assert chain("+Sin[x]") == ["Sin", "x"] + assert chain("-Sin[x]") == ["Times", "-1", ["Sin", "x"]] + assert chain("x(a+1)") == ["Times", "x", ["Plus", "a", "1"]] + assert chain("(x)") == "x" + assert chain("(+x)") == "x" + assert chain("-a") == ["Times", "-1", "a"] + assert chain("(-x)") == ["Times", "-1", "x"] + assert chain("(x + y)") == ["Plus", "x", "y"] + assert chain("3 + 4") == ["Plus", "3", "4"] + assert chain("a - 3") == ["Plus", "a", "-3"] + assert chain("a - b") == ["Plus", "a", ["Times", "-1", "b"]] + assert chain("7 * 8") == ["Times", "7", "8"] + assert chain("a + b*c") == ["Plus", "a", ["Times", "b", "c"]] + assert chain("a + b* c* d + 2 * e") == ["Plus", "a", ["Times", "b", "c", "d"], ["Times", "2", "e"]] + assert chain("a / b") == ["Times", "a", ["Power", "b", "-1"]] + + # Missing asterisk (*) patterns: + assert chain("x y") == ["Times", "x", "y"] + assert chain("3 4") == ["Times", "3", "4"] + assert chain("a[b] c") == ["Times", ["a", "b"], "c"] + assert chain("(x) (y)") == ["Times", "x", "y"] + assert chain("3 (a)") == ["Times", "3", "a"] + assert chain("(a) b") == ["Times", "a", "b"] + assert chain("4.2") == "4.2" + assert chain("4 2") == ["Times", "4", "2"] + assert chain("4 2") == ["Times", "4", "2"] + assert chain("3 . 4") == ["Dot", "3", "4"] + assert chain("4. 2") == ["Times", "4.", "2"] + assert chain("x.y") == ["Dot", "x", "y"] + assert chain("4.y") == ["Times", "4.", "y"] + assert chain("4 .y") == ["Dot", "4", "y"] + assert chain("x.4") == ["Times", "x", ".4"] + assert chain("x0.3") == ["Times", "x0", ".3"] + assert chain("x. 4") == ["Dot", "x", "4"] + + # Comments + assert chain("a (* +b *) + c") == ["Plus", "a", "c"] + assert chain("a (* + b *) + (**)c (* +d *) + e") == ["Plus", "a", "c", "e"] + assert chain("""a + (* + + b + *) c + (* d + *) e + """) == ["Plus", "a", "c", "e"] + + # Operators couples + and -, * and / are mutually associative: + # (i.e. expression gets flattened when mixing these operators) + assert chain("a*b/c") == ["Times", "a", "b", ["Power", "c", "-1"]] + assert chain("a/b*c") == ["Times", "a", ["Power", "b", "-1"], "c"] + assert chain("a+b-c") == ["Plus", "a", "b", ["Times", "-1", "c"]] + assert chain("a-b+c") == ["Plus", "a", ["Times", "-1", "b"], "c"] + assert chain("-a + b -c ") == ["Plus", ["Times", "-1", "a"], "b", ["Times", "-1", "c"]] + assert chain("a/b/c*d") == ["Times", "a", ["Power", "b", "-1"], ["Power", "c", "-1"], "d"] + assert chain("a/b/c") == ["Times", "a", ["Power", "b", "-1"], ["Power", "c", "-1"]] + assert chain("a-b-c") == ["Plus", "a", ["Times", "-1", "b"], ["Times", "-1", "c"]] + assert chain("1/a") == ["Times", "1", ["Power", "a", "-1"]] + assert chain("1/a/b") == ["Times", "1", ["Power", "a", "-1"], ["Power", "b", "-1"]] + assert chain("-1/a*b") == ["Times", "-1", ["Power", "a", "-1"], "b"] + + # Enclosures of various kinds, i.e. ( ) [ ] [[ ]] { } + assert chain("(a + b) + c") == ["Plus", ["Plus", "a", "b"], "c"] + assert chain(" a + (b + c) + d ") == ["Plus", "a", ["Plus", "b", "c"], "d"] + assert chain("a * (b + c)") == ["Times", "a", ["Plus", "b", "c"]] + assert chain("a b (c d)") == ["Times", "a", "b", ["Times", "c", "d"]] + assert chain("{a, b, 2, c}") == ["List", "a", "b", "2", "c"] + assert chain("{a, {b, c}}") == ["List", "a", ["List", "b", "c"]] + assert chain("{{a}}") == ["List", ["List", "a"]] + assert chain("a[b, c]") == ["a", "b", "c"] + assert chain("a[[b, c]]") == ["Part", "a", "b", "c"] + assert chain("a[b[c]]") == ["a", ["b", "c"]] + assert chain("a[[b, c[[d, {e,f}]]]]") == ["Part", "a", "b", ["Part", "c", "d", ["List", "e", "f"]]] + assert chain("a[b[[c,d]]]") == ["a", ["Part", "b", "c", "d"]] + assert chain("a[[b[c]]]") == ["Part", "a", ["b", "c"]] + assert chain("a[[b[[c]]]]") == ["Part", "a", ["Part", "b", "c"]] + assert chain("a[[b[c[[d]]]]]") == ["Part", "a", ["b", ["Part", "c", "d"]]] + assert chain("a[b[[c[d]]]]") == ["a", ["Part", "b", ["c", "d"]]] + assert chain("x[[a+1, b+2, c+3]]") == ["Part", "x", ["Plus", "a", "1"], ["Plus", "b", "2"], ["Plus", "c", "3"]] + assert chain("x[a+1, b+2, c+3]") == ["x", ["Plus", "a", "1"], ["Plus", "b", "2"], ["Plus", "c", "3"]] + assert chain("{a+1, b+2, c+3}") == ["List", ["Plus", "a", "1"], ["Plus", "b", "2"], ["Plus", "c", "3"]] + + # Flat operator: + assert chain("a*b*c*d*e") == ["Times", "a", "b", "c", "d", "e"] + assert chain("a +b + c+ d+e") == ["Plus", "a", "b", "c", "d", "e"] + + # Right priority operator: + assert chain("a^b") == ["Power", "a", "b"] + assert chain("a^b^c") == ["Power", "a", ["Power", "b", "c"]] + assert chain("a^b^c^d") == ["Power", "a", ["Power", "b", ["Power", "c", "d"]]] + + # Left priority operator: + assert chain("a/.b") == ["ReplaceAll", "a", "b"] + assert chain("a/.b/.c/.d") == ["ReplaceAll", ["ReplaceAll", ["ReplaceAll", "a", "b"], "c"], "d"] + + assert chain("a//b") == ["a", "b"] + assert chain("a//b//c") == [["a", "b"], "c"] + assert chain("a//b//c//d") == [[["a", "b"], "c"], "d"] + + # Compound expressions + assert chain("a;b") == ["CompoundExpression", "a", "b"] + assert chain("a;") == ["CompoundExpression", "a", "Null"] + assert chain("a;b;") == ["CompoundExpression", "a", "b", "Null"] + assert chain("a[b;c]") == ["a", ["CompoundExpression", "b", "c"]] + assert chain("a[b,c;d,e]") == ["a", "b", ["CompoundExpression", "c", "d"], "e"] + assert chain("a[b,c;,d]") == ["a", "b", ["CompoundExpression", "c", "Null"], "d"] + + # New lines + assert chain("a\nb\n") == ["CompoundExpression", "a", "b"] + assert chain("a\n\nb\n (c \nd) \n") == ["CompoundExpression", "a", "b", ["Times", "c", "d"]] + assert chain("\na; b\nc") == ["CompoundExpression", "a", "b", "c"] + assert chain("a + \nb\n") == ["Plus", "a", "b"] + assert chain("a\nb; c; d\n e; (f \n g); h + \n i") == ["CompoundExpression", "a", "b", "c", "d", "e", ["Times", "f", "g"], ["Plus", "h", "i"]] + assert chain("\n{\na\nb; c; d\n e (f \n g); h + \n i\n\n}\n") == ["List", ["CompoundExpression", ["Times", "a", "b"], "c", ["Times", "d", "e", ["Times", "f", "g"]], ["Plus", "h", "i"]]] + + # Patterns + assert chain("y_") == ["Pattern", "y", ["Blank"]] + assert chain("y_.") == ["Optional", ["Pattern", "y", ["Blank"]]] + assert chain("y__") == ["Pattern", "y", ["BlankSequence"]] + assert chain("y___") == ["Pattern", "y", ["BlankNullSequence"]] + assert chain("a[b_.,c_]") == ["a", ["Optional", ["Pattern", "b", ["Blank"]]], ["Pattern", "c", ["Blank"]]] + assert chain("b_. c") == ["Times", ["Optional", ["Pattern", "b", ["Blank"]]], "c"] + + # Slots for lambda functions + assert chain("#") == ["Slot", "1"] + assert chain("#3") == ["Slot", "3"] + assert chain("#n") == ["Slot", "n"] + assert chain("##") == ["SlotSequence", "1"] + assert chain("##a") == ["SlotSequence", "a"] + + # Lambda functions + assert chain("x&") == ["Function", "x"] + assert chain("#&") == ["Function", ["Slot", "1"]] + assert chain("#+3&") == ["Function", ["Plus", ["Slot", "1"], "3"]] + assert chain("#1 + #2&") == ["Function", ["Plus", ["Slot", "1"], ["Slot", "2"]]] + assert chain("# + #&") == ["Function", ["Plus", ["Slot", "1"], ["Slot", "1"]]] + assert chain("#&[x]") == [["Function", ["Slot", "1"]], "x"] + assert chain("#1 + #2 & [x, y]") == [["Function", ["Plus", ["Slot", "1"], ["Slot", "2"]]], "x", "y"] + assert chain("#1^2#2^3&") == ["Function", ["Times", ["Power", ["Slot", "1"], "2"], ["Power", ["Slot", "2"], "3"]]] + + # Strings inside Mathematica expressions: + assert chain('"abc"') == ["_Str", "abc"] + assert chain('"a\\"b"') == ["_Str", 'a"b'] + # This expression does not make sense mathematically, it's just testing the parser: + assert chain('x + "abc" ^ 3') == ["Plus", "x", ["Power", ["_Str", "abc"], "3"]] + assert chain('"a (* b *) c"') == ["_Str", "a (* b *) c"] + assert chain('"a" (* b *) ') == ["_Str", "a"] + assert chain('"a [ b] "') == ["_Str", "a [ b] "] + raises(SyntaxError, lambda: chain('"')) + raises(SyntaxError, lambda: chain('"\\"')) + raises(SyntaxError, lambda: chain('"abc')) + raises(SyntaxError, lambda: chain('"abc\\"def')) + + # Invalid expressions: + raises(SyntaxError, lambda: chain("(,")) + raises(SyntaxError, lambda: chain("()")) + raises(SyntaxError, lambda: chain("a (* b")) + + +def test_parser_mathematica_exp_alt(): + parser = MathematicaParser() + + convert_chain2 = lambda expr: parser._from_fullformlist_to_fullformsympy(parser._from_fullform_to_fullformlist(expr)) + convert_chain3 = lambda expr: parser._from_fullformsympy_to_sympy(convert_chain2(expr)) + + Sin, Times, Plus, Power = symbols("Sin Times Plus Power", cls=Function) + + full_form1 = "Sin[Times[x, y]]" + full_form2 = "Plus[Times[x, y], z]" + full_form3 = "Sin[Times[x, Plus[y, z], Power[w, n]]]]" + full_form4 = "Rational[Rational[x, y], z]" + + assert parser._from_fullform_to_fullformlist(full_form1) == ["Sin", ["Times", "x", "y"]] + assert parser._from_fullform_to_fullformlist(full_form2) == ["Plus", ["Times", "x", "y"], "z"] + assert parser._from_fullform_to_fullformlist(full_form3) == ["Sin", ["Times", "x", ["Plus", "y", "z"], ["Power", "w", "n"]]] + assert parser._from_fullform_to_fullformlist(full_form4) == ["Rational", ["Rational", "x", "y"], "z"] + + assert convert_chain2(full_form1) == Sin(Times(x, y)) + assert convert_chain2(full_form2) == Plus(Times(x, y), z) + assert convert_chain2(full_form3) == Sin(Times(x, Plus(y, z), Power(w, n))) + + assert convert_chain3(full_form1) == sin(x*y) + assert convert_chain3(full_form2) == x*y + z + assert convert_chain3(full_form3) == sin(x*(y + z)*w**n) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_maxima.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_maxima.py new file mode 100644 index 0000000000000000000000000000000000000000..c0bc1db8f1385ed52e8c677a1bcc759f5118d01e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_maxima.py @@ -0,0 +1,50 @@ +from sympy.parsing.maxima import parse_maxima +from sympy.core.numbers import (E, Rational, oo) +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.abc import x + +n = Symbol('n', integer=True) + + +def test_parser(): + assert Abs(parse_maxima('float(1/3)') - 0.333333333) < 10**(-5) + assert parse_maxima('13^26') == 91733330193268616658399616009 + assert parse_maxima('sin(%pi/2) + cos(%pi/3)') == Rational(3, 2) + assert parse_maxima('log(%e)') == 1 + + +def test_injection(): + parse_maxima('c: x+1', globals=globals()) + # c created by parse_maxima + assert c == x + 1 # noqa:F821 + + parse_maxima('g: sqrt(81)', globals=globals()) + # g created by parse_maxima + assert g == 9 # noqa:F821 + + +def test_maxima_functions(): + assert parse_maxima('expand( (x+1)^2)') == x**2 + 2*x + 1 + assert parse_maxima('factor( x**2 + 2*x + 1)') == (x + 1)**2 + assert parse_maxima('2*cos(x)^2 + sin(x)^2') == 2*cos(x)**2 + sin(x)**2 + assert parse_maxima('trigexpand(sin(2*x)+cos(2*x))') == \ + -1 + 2*cos(x)**2 + 2*cos(x)*sin(x) + assert parse_maxima('solve(x^2-4,x)') == [-2, 2] + assert parse_maxima('limit((1+1/x)^x,x,inf)') == E + assert parse_maxima('limit(sqrt(-x)/x,x,0,minus)') is -oo + assert parse_maxima('diff(x^x, x)') == x**x*(1 + log(x)) + assert parse_maxima('sum(k, k, 1, n)', name_dict={ + "n": Symbol('n', integer=True), + "k": Symbol('k', integer=True) + }) == (n**2 + n)/2 + assert parse_maxima('product(k, k, 1, n)', name_dict={ + "n": Symbol('n', integer=True), + "k": Symbol('k', integer=True) + }) == factorial(n) + assert parse_maxima('ratsimp((x^2-1)/(x+1))') == x - 1 + assert Abs( parse_maxima( + 'float(sec(%pi/3) + csc(%pi/3))') - 3.154700538379252) < 10**(-5) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sym_expr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sym_expr.py new file mode 100644 index 0000000000000000000000000000000000000000..99912805db381b96e7f41a348fe6f90d71adf781 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sym_expr.py @@ -0,0 +1,209 @@ +from sympy.parsing.sym_expr import SymPyExpression +from sympy.testing.pytest import raises +from sympy.external import import_module + +lfortran = import_module('lfortran') +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +if lfortran and cin: + from sympy.codegen.ast import (Variable, IntBaseType, FloatBaseType, String, + Declaration, FloatType) + from sympy.core import Integer, Float + from sympy.core.symbol import Symbol + + expr1 = SymPyExpression() + src = """\ + integer :: a, b, c, d + real :: p, q, r, s + """ + + def test_c_parse(): + src1 = """\ + int a, b = 4; + float c, d = 2.4; + """ + expr1.convert_to_expr(src1, 'c') + ls = expr1.return_expr() + + assert ls[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + assert ls[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ) + assert ls[2] == Declaration( + Variable( + Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + assert ls[3] == Declaration( + Variable( + Symbol('d'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.3999999999999999', precision=53) + ) + ) + + + def test_fortran_parse(): + expr = SymPyExpression(src, 'f') + ls = expr.return_expr() + + assert ls[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ) + assert ls[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ) + assert ls[2] == Declaration( + Variable( + Symbol('c'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ) + assert ls[3] == Declaration( + Variable( + Symbol('d'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ) + assert ls[4] == Declaration( + Variable( + Symbol('p'), + type=FloatBaseType(String('real')), + value=Float('0.0', precision=53) + ) + ) + assert ls[5] == Declaration( + Variable( + Symbol('q'), + type=FloatBaseType(String('real')), + value=Float('0.0', precision=53) + ) + ) + assert ls[6] == Declaration( + Variable( + Symbol('r'), + type=FloatBaseType(String('real')), + value=Float('0.0', precision=53) + ) + ) + assert ls[7] == Declaration( + Variable( + Symbol('s'), + type=FloatBaseType(String('real')), + value=Float('0.0', precision=53) + ) + ) + + + def test_convert_py(): + src1 = ( + src + + """\ + a = b + c + s = p * q / r + """ + ) + expr1.convert_to_expr(src1, 'f') + exp_py = expr1.convert_to_python() + assert exp_py == [ + 'a = 0', + 'b = 0', + 'c = 0', + 'd = 0', + 'p = 0.0', + 'q = 0.0', + 'r = 0.0', + 's = 0.0', + 'a = b + c', + 's = p*q/r' + ] + + + def test_convert_fort(): + src1 = ( + src + + """\ + a = b + c + s = p * q / r + """ + ) + expr1.convert_to_expr(src1, 'f') + exp_fort = expr1.convert_to_fortran() + assert exp_fort == [ + ' integer*4 a', + ' integer*4 b', + ' integer*4 c', + ' integer*4 d', + ' real*8 p', + ' real*8 q', + ' real*8 r', + ' real*8 s', + ' a = b + c', + ' s = p*q/r' + ] + + + def test_convert_c(): + src1 = ( + src + + """\ + a = b + c + s = p * q / r + """ + ) + expr1.convert_to_expr(src1, 'f') + exp_c = expr1.convert_to_c() + assert exp_c == [ + 'int a = 0', + 'int b = 0', + 'int c = 0', + 'int d = 0', + 'double p = 0.0', + 'double q = 0.0', + 'double r = 0.0', + 'double s = 0.0', + 'a = b + c;', + 's = p*q/r;' + ] + + + def test_exceptions(): + src = 'int a;' + raises(ValueError, lambda: SymPyExpression(src)) + raises(ValueError, lambda: SymPyExpression(mode = 'c')) + raises(NotImplementedError, lambda: SymPyExpression(src, mode = 'd')) + +elif not lfortran and not cin: + def test_raise(): + raises(ImportError, lambda: SymPyExpression('int a;', 'c')) + raises(ImportError, lambda: SymPyExpression('integer :: a', 'f')) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sympy_parser.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sympy_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..43ecccbe262ffb4093248d891aa7423c8f62c628 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/parsing/tests/test_sympy_parser.py @@ -0,0 +1,371 @@ +# -*- coding: utf-8 -*- + + +import builtins +import types + +from sympy.assumptions import Q +from sympy.core import Symbol, Function, Float, Rational, Integer, I, Mul, Pow, Eq, Lt, Le, Gt, Ge, Ne +from sympy.functions import exp, factorial, factorial2, sin, Min, Max +from sympy.logic import And +from sympy.series import Limit +from sympy.testing.pytest import raises + +from sympy.parsing.sympy_parser import ( + parse_expr, standard_transformations, rationalize, TokenError, + split_symbols, implicit_multiplication, convert_equals_signs, + convert_xor, function_exponentiation, lambda_notation, auto_symbol, + repeated_decimals, implicit_multiplication_application, + auto_number, factorial_notation, implicit_application, + _transformation, T + ) + + +def test_sympy_parser(): + x = Symbol('x') + inputs = { + '2*x': 2 * x, + '3.00': Float(3), + '22/7': Rational(22, 7), + '2+3j': 2 + 3*I, + 'exp(x)': exp(x), + 'x!': factorial(x), + 'x!!': factorial2(x), + '(x + 1)! - 1': factorial(x + 1) - 1, + '3.[3]': Rational(10, 3), + '.0[3]': Rational(1, 30), + '3.2[3]': Rational(97, 30), + '1.3[12]': Rational(433, 330), + '1 + 3.[3]': Rational(13, 3), + '1 + .0[3]': Rational(31, 30), + '1 + 3.2[3]': Rational(127, 30), + '.[0011]': Rational(1, 909), + '0.1[00102] + 1': Rational(366697, 333330), + '1.[0191]': Rational(10190, 9999), + '10!': 3628800, + '-(2)': -Integer(2), + '[-1, -2, 3]': [Integer(-1), Integer(-2), Integer(3)], + 'Symbol("x").free_symbols': x.free_symbols, + "S('S(3).n(n=3)')": Float(3, 3), + 'factorint(12, visual=True)': Mul( + Pow(2, 2, evaluate=False), + Pow(3, 1, evaluate=False), + evaluate=False), + 'Limit(sin(x), x, 0, dir="-")': Limit(sin(x), x, 0, dir='-'), + 'Q.even(x)': Q.even(x), + + + } + for text, result in inputs.items(): + assert parse_expr(text) == result + + raises(TypeError, lambda: + parse_expr('x', standard_transformations)) + raises(TypeError, lambda: + parse_expr('x', transformations=lambda x,y: 1)) + raises(TypeError, lambda: + parse_expr('x', transformations=(lambda x,y: 1,))) + raises(TypeError, lambda: parse_expr('x', transformations=((),))) + raises(TypeError, lambda: parse_expr('x', {}, [], [])) + raises(TypeError, lambda: parse_expr('x', [], [], {})) + raises(TypeError, lambda: parse_expr('x', [], [], {})) + + +def test_rationalize(): + inputs = { + '0.123': Rational(123, 1000) + } + transformations = standard_transformations + (rationalize,) + for text, result in inputs.items(): + assert parse_expr(text, transformations=transformations) == result + + +def test_factorial_fail(): + inputs = ['x!!!', 'x!!!!', '(!)'] + + + for text in inputs: + try: + parse_expr(text) + assert False + except TokenError: + assert True + + +def test_repeated_fail(): + inputs = ['1[1]', '.1e1[1]', '0x1[1]', '1.1j[1]', '1.1[1 + 1]', + '0.1[[1]]', '0x1.1[1]'] + + + # All are valid Python, so only raise TypeError for invalid indexing + for text in inputs: + raises(TypeError, lambda: parse_expr(text)) + + + inputs = ['0.1[', '0.1[1', '0.1[]'] + for text in inputs: + raises((TokenError, SyntaxError), lambda: parse_expr(text)) + + +def test_repeated_dot_only(): + assert parse_expr('.[1]') == Rational(1, 9) + assert parse_expr('1 + .[1]') == Rational(10, 9) + + +def test_local_dict(): + local_dict = { + 'my_function': lambda x: x + 2 + } + inputs = { + 'my_function(2)': Integer(4) + } + for text, result in inputs.items(): + assert parse_expr(text, local_dict=local_dict) == result + + +def test_local_dict_split_implmult(): + t = standard_transformations + (split_symbols, implicit_multiplication,) + w = Symbol('w', real=True) + y = Symbol('y') + assert parse_expr('yx', local_dict={'x':w}, transformations=t) == y*w + + +def test_local_dict_symbol_to_fcn(): + x = Symbol('x') + d = {'foo': Function('bar')} + assert parse_expr('foo(x)', local_dict=d) == d['foo'](x) + d = {'foo': Symbol('baz')} + raises(TypeError, lambda: parse_expr('foo(x)', local_dict=d)) + + +def test_global_dict(): + global_dict = { + 'Symbol': Symbol + } + inputs = { + 'Q & S': And(Symbol('Q'), Symbol('S')) + } + for text, result in inputs.items(): + assert parse_expr(text, global_dict=global_dict) == result + + +def test_no_globals(): + + # Replicate creating the default global_dict: + default_globals = {} + exec('from sympy import *', default_globals) + builtins_dict = vars(builtins) + for name, obj in builtins_dict.items(): + if isinstance(obj, types.BuiltinFunctionType): + default_globals[name] = obj + default_globals['max'] = Max + default_globals['min'] = Min + + # Need to include Symbol or parse_expr will not work: + default_globals.pop('Symbol') + global_dict = {'Symbol':Symbol} + + for name in default_globals: + obj = parse_expr(name, global_dict=global_dict) + assert obj == Symbol(name) + + +def test_issue_2515(): + raises(TokenError, lambda: parse_expr('(()')) + raises(TokenError, lambda: parse_expr('"""')) + + +def test_issue_7663(): + x = Symbol('x') + e = '2*(x+1)' + assert parse_expr(e, evaluate=False) == parse_expr(e, evaluate=False) + assert parse_expr(e, evaluate=False).equals(2*(x+1)) + +def test_recursive_evaluate_false_10560(): + inputs = { + '4*-3' : '4*-3', + '-4*3' : '(-4)*3', + "-2*x*y": '(-2)*x*y', + "x*-4*x": "x*(-4)*x" + } + for text, result in inputs.items(): + assert parse_expr(text, evaluate=False) == parse_expr(result, evaluate=False) + + +def test_function_evaluate_false(): + inputs = [ + 'Abs(0)', 'im(0)', 're(0)', 'sign(0)', 'arg(0)', 'conjugate(0)', + 'acos(0)', 'acot(0)', 'acsc(0)', 'asec(0)', 'asin(0)', 'atan(0)', + 'acosh(0)', 'acoth(0)', 'acsch(0)', 'asech(0)', 'asinh(0)', 'atanh(0)', + 'cos(0)', 'cot(0)', 'csc(0)', 'sec(0)', 'sin(0)', 'tan(0)', + 'cosh(0)', 'coth(0)', 'csch(0)', 'sech(0)', 'sinh(0)', 'tanh(0)', + 'exp(0)', 'log(0)', 'sqrt(0)', + ] + for case in inputs: + expr = parse_expr(case, evaluate=False) + assert case == str(expr) != str(expr.doit()) + assert str(parse_expr('ln(0)', evaluate=False)) == 'log(0)' + assert str(parse_expr('cbrt(0)', evaluate=False)) == '0**(1/3)' + + +def test_issue_10773(): + inputs = { + '-10/5': '(-10)/5', + '-10/-5' : '(-10)/(-5)', + } + for text, result in inputs.items(): + assert parse_expr(text, evaluate=False) == parse_expr(result, evaluate=False) + + +def test_split_symbols(): + transformations = standard_transformations + \ + (split_symbols, implicit_multiplication,) + x = Symbol('x') + y = Symbol('y') + xy = Symbol('xy') + + + assert parse_expr("xy") == xy + assert parse_expr("xy", transformations=transformations) == x*y + + +def test_split_symbols_function(): + transformations = standard_transformations + \ + (split_symbols, implicit_multiplication,) + x = Symbol('x') + y = Symbol('y') + a = Symbol('a') + f = Function('f') + + + assert parse_expr("ay(x+1)", transformations=transformations) == a*y*(x+1) + assert parse_expr("af(x+1)", transformations=transformations, + local_dict={'f':f}) == a*f(x+1) + + +def test_functional_exponent(): + t = standard_transformations + (convert_xor, function_exponentiation) + x = Symbol('x') + y = Symbol('y') + a = Symbol('a') + yfcn = Function('y') + assert parse_expr("sin^2(x)", transformations=t) == (sin(x))**2 + assert parse_expr("sin^y(x)", transformations=t) == (sin(x))**y + assert parse_expr("exp^y(x)", transformations=t) == (exp(x))**y + assert parse_expr("E^y(x)", transformations=t) == exp(yfcn(x)) + assert parse_expr("a^y(x)", transformations=t) == a**(yfcn(x)) + + +def test_match_parentheses_implicit_multiplication(): + transformations = standard_transformations + \ + (implicit_multiplication,) + raises(TokenError, lambda: parse_expr('(1,2),(3,4]',transformations=transformations)) + + +def test_convert_equals_signs(): + transformations = standard_transformations + \ + (convert_equals_signs, ) + x = Symbol('x') + y = Symbol('y') + assert parse_expr("1*2=x", transformations=transformations) == Eq(2, x) + assert parse_expr("y = x", transformations=transformations) == Eq(y, x) + assert parse_expr("(2*y = x) = False", + transformations=transformations) == Eq(Eq(2*y, x), False) + + +def test_parse_function_issue_3539(): + x = Symbol('x') + f = Function('f') + assert parse_expr('f(x)') == f(x) + +def test_issue_24288(): + assert parse_expr("1 < 2", evaluate=False) == Lt(1, 2, evaluate=False) + assert parse_expr("1 <= 2", evaluate=False) == Le(1, 2, evaluate=False) + assert parse_expr("1 > 2", evaluate=False) == Gt(1, 2, evaluate=False) + assert parse_expr("1 >= 2", evaluate=False) == Ge(1, 2, evaluate=False) + assert parse_expr("1 != 2", evaluate=False) == Ne(1, 2, evaluate=False) + assert parse_expr("1 == 2", evaluate=False) == Eq(1, 2, evaluate=False) + assert parse_expr("1 < 2 < 3", evaluate=False) == And(Lt(1, 2, evaluate=False), Lt(2, 3, evaluate=False), evaluate=False) + assert parse_expr("1 <= 2 <= 3", evaluate=False) == And(Le(1, 2, evaluate=False), Le(2, 3, evaluate=False), evaluate=False) + assert parse_expr("1 < 2 <= 3 < 4", evaluate=False) == \ + And(Lt(1, 2, evaluate=False), Le(2, 3, evaluate=False), Lt(3, 4, evaluate=False), evaluate=False) + # Valid Python relational operators that SymPy does not decide how to handle them yet + raises(ValueError, lambda: parse_expr("1 in 2", evaluate=False)) + raises(ValueError, lambda: parse_expr("1 is 2", evaluate=False)) + raises(ValueError, lambda: parse_expr("1 not in 2", evaluate=False)) + raises(ValueError, lambda: parse_expr("1 is not 2", evaluate=False)) + +def test_split_symbols_numeric(): + transformations = ( + standard_transformations + + (implicit_multiplication_application,)) + + n = Symbol('n') + expr1 = parse_expr('2**n * 3**n') + expr2 = parse_expr('2**n3**n', transformations=transformations) + assert expr1 == expr2 == 2**n*3**n + + expr1 = parse_expr('n12n34', transformations=transformations) + assert expr1 == n*12*n*34 + + +def test_unicode_names(): + assert parse_expr('α') == Symbol('α') + + +def test_python3_features(): + assert parse_expr("123_456") == 123456 + assert parse_expr("1.2[3_4]") == parse_expr("1.2[34]") == Rational(611, 495) + assert parse_expr("1.2[012_012]") == parse_expr("1.2[012012]") == Rational(400, 333) + assert parse_expr('.[3_4]') == parse_expr('.[34]') == Rational(34, 99) + assert parse_expr('.1[3_4]') == parse_expr('.1[34]') == Rational(133, 990) + assert parse_expr('123_123.123_123[3_4]') == parse_expr('123123.123123[34]') == Rational(12189189189211, 99000000) + + +def test_issue_19501(): + x = Symbol('x') + eq = parse_expr('E**x(1+x)', local_dict={'x': x}, transformations=( + standard_transformations + + (implicit_multiplication_application,))) + assert eq.free_symbols == {x} + + +def test_parsing_definitions(): + from sympy.abc import x + assert len(_transformation) == 12 # if this changes, extend below + assert _transformation[0] == lambda_notation + assert _transformation[1] == auto_symbol + assert _transformation[2] == repeated_decimals + assert _transformation[3] == auto_number + assert _transformation[4] == factorial_notation + assert _transformation[5] == implicit_multiplication_application + assert _transformation[6] == convert_xor + assert _transformation[7] == implicit_application + assert _transformation[8] == implicit_multiplication + assert _transformation[9] == convert_equals_signs + assert _transformation[10] == function_exponentiation + assert _transformation[11] == rationalize + assert T[:5] == T[0,1,2,3,4] == standard_transformations + t = _transformation + assert T[-1, 0] == (t[len(t) - 1], t[0]) + assert T[:5, 8] == standard_transformations + (t[8],) + assert parse_expr('0.3x^2', transformations='all') == 3*x**2/10 + assert parse_expr('sin 3x', transformations='implicit') == sin(3*x) + + +def test_builtins(): + cases = [ + ('abs(x)', 'Abs(x)'), + ('max(x, y)', 'Max(x, y)'), + ('min(x, y)', 'Min(x, y)'), + ('pow(x, y)', 'Pow(x, y)'), + ] + for built_in_func_call, sympy_func_call in cases: + assert parse_expr(built_in_func_call) == parse_expr(sympy_func_call) + assert str(parse_expr('pow(38, -1, 97)')) == '23' + + +def test_issue_22822(): + raises(ValueError, lambda: parse_expr('x', {'': 1})) + data = {'some_parameter': None} + assert parse_expr('some_parameter is None', data) is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..074bcf93b7375eb3dc96d16b5450b539074d8f7d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/__init__.py @@ -0,0 +1,22 @@ +from .plot import plot_backends +from .plot_implicit import plot_implicit +from .textplot import textplot +from .pygletplot import PygletPlot +from .plot import PlotGrid +from .plot import (plot, plot_parametric, plot3d, plot3d_parametric_surface, + plot3d_parametric_line, plot_contour) + +__all__ = [ + 'plot_backends', + + 'plot_implicit', + + 'textplot', + + 'PygletPlot', + + 'PlotGrid', + + 'plot', 'plot_parametric', 'plot3d', 'plot3d_parametric_surface', + 'plot3d_parametric_line', 'plot_contour' +] diff --git 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a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/base_backend.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/base_backend.py new file mode 100644 index 0000000000000000000000000000000000000000..a43cfa18eb7aff90ddacd6cdb60dfb0dadcb0abf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/base_backend.py @@ -0,0 +1,419 @@ +from sympy.plotting.series import BaseSeries, GenericDataSeries +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import is_sequence + + +__doctest_requires__ = { + ('Plot.append', 'Plot.extend'): ['matplotlib'], +} + + +# Global variable +# Set to False when running tests / doctests so that the plots don't show. +_show = True + +def unset_show(): + """ + Disable show(). For use in the tests. + """ + global _show + _show = False + + +def _deprecation_msg_m_a_r_f(attr): + sympy_deprecation_warning( + f"The `{attr}` property is deprecated. The `{attr}` keyword " + "argument should be passed to a plotting function, which generates " + "the appropriate data series. If needed, index the plot object to " + "retrieve a specific data series.", + deprecated_since_version="1.13", + active_deprecations_target="deprecated-markers-annotations-fill-rectangles", + stacklevel=4) + + +def _create_generic_data_series(**kwargs): + keywords = ["annotations", "markers", "fill", "rectangles"] + series = [] + for kw in keywords: + dictionaries = kwargs.pop(kw, []) + if dictionaries is None: + dictionaries = [] + if isinstance(dictionaries, dict): + dictionaries = [dictionaries] + for d in dictionaries: + args = d.pop("args", []) + series.append(GenericDataSeries(kw, *args, **d)) + return series + + +class Plot: + """Base class for all backends. A backend represents the plotting library, + which implements the necessary functionalities in order to use SymPy + plotting functions. + + For interactive work the function :func:`plot` is better suited. + + This class permits the plotting of SymPy expressions using numerous + backends (:external:mod:`matplotlib`, textplot, the old pyglet module for SymPy, Google + charts api, etc). + + The figure can contain an arbitrary number of plots of SymPy expressions, + lists of coordinates of points, etc. Plot has a private attribute _series that + contains all data series to be plotted (expressions for lines or surfaces, + lists of points, etc (all subclasses of BaseSeries)). Those data series are + instances of classes not imported by ``from sympy import *``. + + The customization of the figure is on two levels. Global options that + concern the figure as a whole (e.g. title, xlabel, scale, etc) and + per-data series options (e.g. name) and aesthetics (e.g. color, point shape, + line type, etc.). + + The difference between options and aesthetics is that an aesthetic can be + a function of the coordinates (or parameters in a parametric plot). The + supported values for an aesthetic are: + + - None (the backend uses default values) + - a constant + - a function of one variable (the first coordinate or parameter) + - a function of two variables (the first and second coordinate or parameters) + - a function of three variables (only in nonparametric 3D plots) + + Their implementation depends on the backend so they may not work in some + backends. + + If the plot is parametric and the arity of the aesthetic function permits + it the aesthetic is calculated over parameters and not over coordinates. + If the arity does not permit calculation over parameters the calculation is + done over coordinates. + + Only cartesian coordinates are supported for the moment, but you can use + the parametric plots to plot in polar, spherical and cylindrical + coordinates. + + The arguments for the constructor Plot must be subclasses of BaseSeries. + + Any global option can be specified as a keyword argument. + + The global options for a figure are: + + - title : str + - xlabel : str or Symbol + - ylabel : str or Symbol + - zlabel : str or Symbol + - legend : bool + - xscale : {'linear', 'log'} + - yscale : {'linear', 'log'} + - axis : bool + - axis_center : tuple of two floats or {'center', 'auto'} + - xlim : tuple of two floats + - ylim : tuple of two floats + - aspect_ratio : tuple of two floats or {'auto'} + - autoscale : bool + - margin : float in [0, 1] + - backend : {'default', 'matplotlib', 'text'} or a subclass of BaseBackend + - size : optional tuple of two floats, (width, height); default: None + + The per data series options and aesthetics are: + There are none in the base series. See below for options for subclasses. + + Some data series support additional aesthetics or options: + + :class:`~.LineOver1DRangeSeries`, :class:`~.Parametric2DLineSeries`, and + :class:`~.Parametric3DLineSeries` support the following: + + Aesthetics: + + - line_color : string, or float, or function, optional + Specifies the color for the plot, which depends on the backend being + used. + + For example, if ``MatplotlibBackend`` is being used, then + Matplotlib string colors are acceptable (``"red"``, ``"r"``, + ``"cyan"``, ``"c"``, ...). + Alternatively, we can use a float number, 0 < color < 1, wrapped in a + string (for example, ``line_color="0.5"``) to specify grayscale colors. + Alternatively, We can specify a function returning a single + float value: this will be used to apply a color-loop (for example, + ``line_color=lambda x: math.cos(x)``). + + Note that by setting line_color, it would be applied simultaneously + to all the series. + + Options: + + - label : str + - steps : bool + - integers_only : bool + + :class:`~.SurfaceOver2DRangeSeries` and :class:`~.ParametricSurfaceSeries` + support the following: + + Aesthetics: + + - surface_color : function which returns a float. + + Notes + ===== + + How the plotting module works: + + 1. Whenever a plotting function is called, the provided expressions are + processed and a list of instances of the + :class:`~sympy.plotting.series.BaseSeries` class is created, containing + the necessary information to plot the expressions + (e.g. the expression, ranges, series name, ...). Eventually, these + objects will generate the numerical data to be plotted. + 2. A subclass of :class:`~.Plot` class is instantiaed (referred to as + backend, from now on), which stores the list of series and the main + attributes of the plot (e.g. axis labels, title, ...). + The backend implements the logic to generate the actual figure with + some plotting library. + 3. When the ``show`` command is executed, series are processed one by one + to generate numerical data and add it to the figure. The backend is also + going to set the axis labels, title, ..., according to the values stored + in the Plot instance. + + The backend should check if it supports the data series that it is given + (e.g. :class:`TextBackend` supports only + :class:`~sympy.plotting.series.LineOver1DRangeSeries`). + + It is the backend responsibility to know how to use the class of data series + that it's given. Note that the current implementation of the ``*Series`` + classes is "matplotlib-centric": the numerical data returned by the + ``get_points`` and ``get_meshes`` methods is meant to be used directly by + Matplotlib. Therefore, the new backend will have to pre-process the + numerical data to make it compatible with the chosen plotting library. + Keep in mind that future SymPy versions may improve the ``*Series`` classes + in order to return numerical data "non-matplotlib-centric", hence if you code + a new backend you have the responsibility to check if its working on each + SymPy release. + + Please explore the :class:`MatplotlibBackend` source code to understand + how a backend should be coded. + + In order to be used by SymPy plotting functions, a backend must implement + the following methods: + + * show(self): used to loop over the data series, generate the numerical + data, plot it and set the axis labels, title, ... + * save(self, path): used to save the current plot to the specified file + path. + * close(self): used to close the current plot backend (note: some plotting + library does not support this functionality. In that case, just raise a + warning). + """ + + def __init__(self, *args, + title=None, xlabel=None, ylabel=None, zlabel=None, aspect_ratio='auto', + xlim=None, ylim=None, axis_center='auto', axis=True, + xscale='linear', yscale='linear', legend=False, autoscale=True, + margin=0, annotations=None, markers=None, rectangles=None, + fill=None, backend='default', size=None, **kwargs): + + # Options for the graph as a whole. + # The possible values for each option are described in the docstring of + # Plot. They are based purely on convention, no checking is done. + self.title = title + self.xlabel = xlabel + self.ylabel = ylabel + self.zlabel = zlabel + self.aspect_ratio = aspect_ratio + self.axis_center = axis_center + self.axis = axis + self.xscale = xscale + self.yscale = yscale + self.legend = legend + self.autoscale = autoscale + self.margin = margin + self._annotations = annotations + self._markers = markers + self._rectangles = rectangles + self._fill = fill + + # Contains the data objects to be plotted. The backend should be smart + # enough to iterate over this list. + self._series = [] + self._series.extend(args) + self._series.extend(_create_generic_data_series( + annotations=annotations, markers=markers, rectangles=rectangles, + fill=fill)) + + is_real = \ + lambda lim: all(getattr(i, 'is_real', True) for i in lim) + is_finite = \ + lambda lim: all(getattr(i, 'is_finite', True) for i in lim) + + # reduce code repetition + def check_and_set(t_name, t): + if t: + if not is_real(t): + raise ValueError( + "All numbers from {}={} must be real".format(t_name, t)) + if not is_finite(t): + raise ValueError( + "All numbers from {}={} must be finite".format(t_name, t)) + setattr(self, t_name, (float(t[0]), float(t[1]))) + + self.xlim = None + check_and_set("xlim", xlim) + self.ylim = None + check_and_set("ylim", ylim) + self.size = None + check_and_set("size", size) + + @property + def _backend(self): + return self + + @property + def backend(self): + return type(self) + + def __str__(self): + series_strs = [('[%d]: ' % i) + str(s) + for i, s in enumerate(self._series)] + return 'Plot object containing:\n' + '\n'.join(series_strs) + + def __getitem__(self, index): + return self._series[index] + + def __setitem__(self, index, *args): + if len(args) == 1 and isinstance(args[0], BaseSeries): + self._series[index] = args + + def __delitem__(self, index): + del self._series[index] + + def append(self, arg): + """Adds an element from a plot's series to an existing plot. + + Examples + ======== + + Consider two ``Plot`` objects, ``p1`` and ``p2``. To add the + second plot's first series object to the first, use the + ``append`` method, like so: + + .. plot:: + :format: doctest + :include-source: True + + >>> from sympy import symbols + >>> from sympy.plotting import plot + >>> x = symbols('x') + >>> p1 = plot(x*x, show=False) + >>> p2 = plot(x, show=False) + >>> p1.append(p2[0]) + >>> p1 + Plot object containing: + [0]: cartesian line: x**2 for x over (-10.0, 10.0) + [1]: cartesian line: x for x over (-10.0, 10.0) + >>> p1.show() + + See Also + ======== + + extend + + """ + if isinstance(arg, BaseSeries): + self._series.append(arg) + else: + raise TypeError('Must specify element of plot to append.') + + def extend(self, arg): + """Adds all series from another plot. + + Examples + ======== + + Consider two ``Plot`` objects, ``p1`` and ``p2``. To add the + second plot to the first, use the ``extend`` method, like so: + + .. plot:: + :format: doctest + :include-source: True + + >>> from sympy import symbols + >>> from sympy.plotting import plot + >>> x = symbols('x') + >>> p1 = plot(x**2, show=False) + >>> p2 = plot(x, -x, show=False) + >>> p1.extend(p2) + >>> p1 + Plot object containing: + [0]: cartesian line: x**2 for x over (-10.0, 10.0) + [1]: cartesian line: x for x over (-10.0, 10.0) + [2]: cartesian line: -x for x over (-10.0, 10.0) + >>> p1.show() + + """ + if isinstance(arg, Plot): + self._series.extend(arg._series) + elif is_sequence(arg): + self._series.extend(arg) + else: + raise TypeError('Expecting Plot or sequence of BaseSeries') + + def show(self): + raise NotImplementedError + + def save(self, path): + raise NotImplementedError + + def close(self): + raise NotImplementedError + + # deprecations + + @property + def markers(self): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("markers") + return self._markers + + @markers.setter + def markers(self, v): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("markers") + self._series.extend(_create_generic_data_series(markers=v)) + self._markers = v + + @property + def annotations(self): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("annotations") + return self._annotations + + @annotations.setter + def annotations(self, v): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("annotations") + self._series.extend(_create_generic_data_series(annotations=v)) + self._annotations = v + + @property + def rectangles(self): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("rectangles") + return self._rectangles + + @rectangles.setter + def rectangles(self, v): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("rectangles") + self._series.extend(_create_generic_data_series(rectangles=v)) + self._rectangles = v + + @property + def fill(self): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("fill") + return self._fill + + @fill.setter + def fill(self, v): + """.. deprecated:: 1.13""" + _deprecation_msg_m_a_r_f("fill") + self._series.extend(_create_generic_data_series(fill=v)) + self._fill = v diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/matplotlibbackend/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/matplotlibbackend/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8623940dadb9272730fdeccc1668374781c2e5cf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/matplotlibbackend/__init__.py @@ -0,0 +1,5 @@ +from sympy.plotting.backends.matplotlibbackend.matplotlib import ( + MatplotlibBackend, _matplotlib_list +) + +__all__ = ["MatplotlibBackend", "_matplotlib_list"] diff --git 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`sympy/testing/runtests.py` + + +def _str_or_latex(label): + if isinstance(label, Basic): + return latex(label, mode='inline') + return str(label) + + +def _matplotlib_list(interval_list): + """ + Returns lists for matplotlib ``fill`` command from a list of bounding + rectangular intervals + """ + xlist = [] + ylist = [] + if len(interval_list): + for intervals in interval_list: + intervalx = intervals[0] + intervaly = intervals[1] + xlist.extend([intervalx.start, intervalx.start, + intervalx.end, intervalx.end, None]) + ylist.extend([intervaly.start, intervaly.end, + intervaly.end, intervaly.start, None]) + else: + #XXX Ugly hack. Matplotlib does not accept empty lists for ``fill`` + xlist.extend((None, None, None, None)) + ylist.extend((None, None, None, None)) + return xlist, ylist + + +# Don't have to check for the success of importing matplotlib in each case; +# we will only be using this backend if we can successfully import matploblib +class MatplotlibBackend(base_backend.Plot): + """ This class implements the functionalities to use Matplotlib with SymPy + plotting functions. + """ + + def __init__(self, *series, **kwargs): + super().__init__(*series, **kwargs) + self.matplotlib = import_module('matplotlib', + import_kwargs={'fromlist': ['pyplot', 'cm', 'collections']}, + min_module_version='1.1.0', catch=(RuntimeError,)) + self.plt = self.matplotlib.pyplot + self.cm = self.matplotlib.cm + self.LineCollection = self.matplotlib.collections.LineCollection + self.aspect = kwargs.get('aspect_ratio', 'auto') + if self.aspect != 'auto': + self.aspect = float(self.aspect[1]) / self.aspect[0] + # PlotGrid can provide its figure and axes to be populated with + # the data from the series. + self._plotgrid_fig = kwargs.pop("fig", None) + self._plotgrid_ax = kwargs.pop("ax", None) + + def _create_figure(self): + def set_spines(ax): + ax.spines['left'].set_position('zero') + ax.spines['right'].set_color('none') + ax.spines['bottom'].set_position('zero') + ax.spines['top'].set_color('none') + ax.xaxis.set_ticks_position('bottom') + ax.yaxis.set_ticks_position('left') + + if self._plotgrid_fig is not None: + self.fig = self._plotgrid_fig + self.ax = self._plotgrid_ax + if not any(s.is_3D for s in self._series): + set_spines(self.ax) + else: + self.fig = self.plt.figure(figsize=self.size) + if any(s.is_3D for s in self._series): + self.ax = self.fig.add_subplot(1, 1, 1, projection="3d") + else: + self.ax = self.fig.add_subplot(1, 1, 1) + set_spines(self.ax) + + @staticmethod + def get_segments(x, y, z=None): + """ Convert two list of coordinates to a list of segments to be used + with Matplotlib's :external:class:`~matplotlib.collections.LineCollection`. + + Parameters + ========== + x : list + List of x-coordinates + + y : list + List of y-coordinates + + z : list + List of z-coordinates for a 3D line. + """ + np = import_module('numpy') + if z is not None: + dim = 3 + points = (x, y, z) + else: + dim = 2 + points = (x, y) + points = np.ma.array(points).T.reshape(-1, 1, dim) + return np.ma.concatenate([points[:-1], points[1:]], axis=1) + + def _process_series(self, series, ax): + np = import_module('numpy') + mpl_toolkits = import_module( + 'mpl_toolkits', import_kwargs={'fromlist': ['mplot3d']}) + + # XXX Workaround for matplotlib issue + # https://github.com/matplotlib/matplotlib/issues/17130 + xlims, ylims, zlims = [], [], [] + + for s in series: + # Create the collections + if s.is_2Dline: + if s.is_parametric: + x, y, param = s.get_data() + else: + x, y = s.get_data() + if (isinstance(s.line_color, (int, float)) or + callable(s.line_color)): + segments = self.get_segments(x, y) + collection = self.LineCollection(segments) + collection.set_array(s.get_color_array()) + ax.add_collection(collection) + else: + lbl = _str_or_latex(s.label) + line, = ax.plot(x, y, label=lbl, color=s.line_color) + elif s.is_contour: + ax.contour(*s.get_data()) + elif s.is_3Dline: + x, y, z, param = s.get_data() + if (isinstance(s.line_color, (int, float)) or + callable(s.line_color)): + art3d = mpl_toolkits.mplot3d.art3d + segments = self.get_segments(x, y, z) + collection = art3d.Line3DCollection(segments) + collection.set_array(s.get_color_array()) + ax.add_collection(collection) + else: + lbl = _str_or_latex(s.label) + ax.plot(x, y, z, label=lbl, color=s.line_color) + + xlims.append(s._xlim) + ylims.append(s._ylim) + zlims.append(s._zlim) + elif s.is_3Dsurface: + if s.is_parametric: + x, y, z, u, v = s.get_data() + else: + x, y, z = s.get_data() + collection = ax.plot_surface(x, y, z, + cmap=getattr(self.cm, 'viridis', self.cm.jet), + rstride=1, cstride=1, linewidth=0.1) + if isinstance(s.surface_color, (float, int, Callable)): + color_array = s.get_color_array() + color_array = color_array.reshape(color_array.size) + collection.set_array(color_array) + else: + collection.set_color(s.surface_color) + + xlims.append(s._xlim) + ylims.append(s._ylim) + zlims.append(s._zlim) + elif s.is_implicit: + points = s.get_data() + if len(points) == 2: + # interval math plotting + x, y = _matplotlib_list(points[0]) + ax.fill(x, y, facecolor=s.line_color, edgecolor='None') + else: + # use contourf or contour depending on whether it is + # an inequality or equality. + # XXX: ``contour`` plots multiple lines. Should be fixed. + ListedColormap = self.matplotlib.colors.ListedColormap + colormap = ListedColormap(["white", s.line_color]) + xarray, yarray, zarray, plot_type = points + if plot_type == 'contour': + ax.contour(xarray, yarray, zarray, cmap=colormap) + else: + ax.contourf(xarray, yarray, zarray, cmap=colormap) + elif s.is_generic: + if s.type == "markers": + # s.rendering_kw["color"] = s.line_color + ax.plot(*s.args, **s.rendering_kw) + elif s.type == "annotations": + ax.annotate(*s.args, **s.rendering_kw) + elif s.type == "fill": + # s.rendering_kw["color"] = s.line_color + ax.fill_between(*s.args, **s.rendering_kw) + elif s.type == "rectangles": + # s.rendering_kw["color"] = s.line_color + ax.add_patch( + self.matplotlib.patches.Rectangle( + *s.args, **s.rendering_kw)) + else: + raise NotImplementedError( + '{} is not supported in the SymPy plotting module ' + 'with matplotlib backend. Please report this issue.' + .format(ax)) + + Axes3D = mpl_toolkits.mplot3d.Axes3D + if not isinstance(ax, Axes3D): + ax.autoscale_view( + scalex=ax.get_autoscalex_on(), + scaley=ax.get_autoscaley_on()) + else: + # XXX Workaround for matplotlib issue + # https://github.com/matplotlib/matplotlib/issues/17130 + if xlims: + xlims = np.array(xlims) + xlim = (np.amin(xlims[:, 0]), np.amax(xlims[:, 1])) + ax.set_xlim(xlim) + else: + ax.set_xlim([0, 1]) + + if ylims: + ylims = np.array(ylims) + ylim = (np.amin(ylims[:, 0]), np.amax(ylims[:, 1])) + ax.set_ylim(ylim) + else: + ax.set_ylim([0, 1]) + + if zlims: + zlims = np.array(zlims) + zlim = (np.amin(zlims[:, 0]), np.amax(zlims[:, 1])) + ax.set_zlim(zlim) + else: + ax.set_zlim([0, 1]) + + # Set global options. + # TODO The 3D stuff + # XXX The order of those is important. + if self.xscale and not isinstance(ax, Axes3D): + ax.set_xscale(self.xscale) + if self.yscale and not isinstance(ax, Axes3D): + ax.set_yscale(self.yscale) + if not isinstance(ax, Axes3D) or self.matplotlib.__version__ >= '1.2.0': # XXX in the distant future remove this check + ax.set_autoscale_on(self.autoscale) + if self.axis_center: + val = self.axis_center + if isinstance(ax, Axes3D): + pass + elif val == 'center': + ax.spines['left'].set_position('center') + ax.spines['bottom'].set_position('center') + elif val == 'auto': + xl, xh = ax.get_xlim() + yl, yh = ax.get_ylim() + pos_left = ('data', 0) if xl*xh <= 0 else 'center' + pos_bottom = ('data', 0) if yl*yh <= 0 else 'center' + ax.spines['left'].set_position(pos_left) + ax.spines['bottom'].set_position(pos_bottom) + else: + ax.spines['left'].set_position(('data', val[0])) + ax.spines['bottom'].set_position(('data', val[1])) + if not self.axis: + ax.set_axis_off() + if self.legend: + if ax.legend(): + ax.legend_.set_visible(self.legend) + if self.margin: + ax.set_xmargin(self.margin) + ax.set_ymargin(self.margin) + if self.title: + ax.set_title(self.title) + if self.xlabel: + xlbl = _str_or_latex(self.xlabel) + ax.set_xlabel(xlbl, position=(1, 0)) + if self.ylabel: + ylbl = _str_or_latex(self.ylabel) + ax.set_ylabel(ylbl, position=(0, 1)) + if isinstance(ax, Axes3D) and self.zlabel: + zlbl = _str_or_latex(self.zlabel) + ax.set_zlabel(zlbl, position=(0, 1)) + + # xlim and ylim should always be set at last so that plot limits + # doesn't get altered during the process. + if self.xlim: + ax.set_xlim(self.xlim) + if self.ylim: + ax.set_ylim(self.ylim) + self.ax.set_aspect(self.aspect) + + + def process_series(self): + """ + Iterates over every ``Plot`` object and further calls + _process_series() + """ + self._create_figure() + self._process_series(self._series, self.ax) + + def show(self): + self.process_series() + #TODO after fixing https://github.com/ipython/ipython/issues/1255 + # you can uncomment the next line and remove the pyplot.show() call + #self.fig.show() + if base_backend._show: + self.fig.tight_layout() + self.plt.show() + else: + self.close() + + def save(self, path): + self.process_series() + self.fig.savefig(path) + + def close(self): + self.plt.close(self.fig) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..ca4685e4b7790653a97b712c27b240ade5bb481a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__init__.py @@ -0,0 +1,3 @@ +from sympy.plotting.backends.textbackend.text import TextBackend + +__all__ = ["TextBackend"] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..7aada9ff5453dabda9da9a877667da8f72af4ca7 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/text.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/text.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..4a57df89c2e9193b03b825a4aa68633b2097ea55 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/__pycache__/text.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/text.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/text.py new file mode 100644 index 0000000000000000000000000000000000000000..0917ec78b3463a929c373c98fdd279d84ce4c9e5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/backends/textbackend/text.py @@ -0,0 +1,24 @@ +import sympy.plotting.backends.base_backend as base_backend +from sympy.plotting.series import LineOver1DRangeSeries +from sympy.plotting.textplot import textplot + + +class TextBackend(base_backend.Plot): + def __init__(self, *args, **kwargs): + super().__init__(*args, **kwargs) + + def show(self): + if not base_backend._show: + return + if len(self._series) != 1: + raise ValueError( + 'The TextBackend supports only one graph per Plot.') + elif not isinstance(self._series[0], LineOver1DRangeSeries): + raise ValueError( + 'The TextBackend supports only expressions over a 1D range') + else: + ser = self._series[0] + textplot(ser.expr, ser.start, ser.end) + + def close(self): + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/experimental_lambdify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/experimental_lambdify.py new file mode 100644 index 0000000000000000000000000000000000000000..ae17e7adf45f2933ccd71514917199c85d14549e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/experimental_lambdify.py @@ -0,0 +1,641 @@ +""" rewrite of lambdify - This stuff is not stable at all. + +It is for internal use in the new plotting module. +It may (will! see the Q'n'A in the source) be rewritten. + +It's completely self contained. Especially it does not use lambdarepr. + +It does not aim to replace the current lambdify. Most importantly it will never +ever support anything else than SymPy expressions (no Matrices, dictionaries +and so on). +""" + + +import re +from sympy.core.numbers import (I, NumberSymbol, oo, zoo) +from sympy.core.symbol import Symbol +from sympy.utilities.iterables import numbered_symbols + +# We parse the expression string into a tree that identifies functions. Then +# we translate the names of the functions and we translate also some strings +# that are not names of functions (all this according to translation +# dictionaries). +# If the translation goes to another module (like numpy) the +# module is imported and 'func' is translated to 'module.func'. +# If a function can not be translated, the inner nodes of that part of the +# tree are not translated. So if we have Integral(sqrt(x)), sqrt is not +# translated to np.sqrt and the Integral does not crash. +# A namespace for all this is generated by crawling the (func, args) tree of +# the expression. The creation of this namespace involves many ugly +# workarounds. +# The namespace consists of all the names needed for the SymPy expression and +# all the name of modules used for translation. Those modules are imported only +# as a name (import numpy as np) in order to keep the namespace small and +# manageable. + +# Please, if there is a bug, do not try to fix it here! Rewrite this by using +# the method proposed in the last Q'n'A below. That way the new function will +# work just as well, be just as simple, but it wont need any new workarounds. +# If you insist on fixing it here, look at the workarounds in the function +# sympy_expression_namespace and in lambdify. + +# Q: Why are you not using Python abstract syntax tree? +# A: Because it is more complicated and not much more powerful in this case. + +# Q: What if I have Symbol('sin') or g=Function('f')? +# A: You will break the algorithm. We should use srepr to defend against this? +# The problem with Symbol('sin') is that it will be printed as 'sin'. The +# parser will distinguish it from the function 'sin' because functions are +# detected thanks to the opening parenthesis, but the lambda expression won't +# understand the difference if we have also the sin function. +# The solution (complicated) is to use srepr and maybe ast. +# The problem with the g=Function('f') is that it will be printed as 'f' but in +# the global namespace we have only 'g'. But as the same printer is used in the +# constructor of the namespace there will be no problem. + +# Q: What if some of the printers are not printing as expected? +# A: The algorithm wont work. You must use srepr for those cases. But even +# srepr may not print well. All problems with printers should be considered +# bugs. + +# Q: What about _imp_ functions? +# A: Those are taken care for by evalf. A special case treatment will work +# faster but it's not worth the code complexity. + +# Q: Will ast fix all possible problems? +# A: No. You will always have to use some printer. Even srepr may not work in +# some cases. But if the printer does not work, that should be considered a +# bug. + +# Q: Is there same way to fix all possible problems? +# A: Probably by constructing our strings ourself by traversing the (func, +# args) tree and creating the namespace at the same time. That actually sounds +# good. + +from sympy.external import import_module +import warnings + +#TODO debugging output + + +class vectorized_lambdify: + """ Return a sufficiently smart, vectorized and lambdified function. + + Returns only reals. + + Explanation + =========== + + This function uses experimental_lambdify to created a lambdified + expression ready to be used with numpy. Many of the functions in SymPy + are not implemented in numpy so in some cases we resort to Python cmath or + even to evalf. + + The following translations are tried: + only numpy complex + - on errors raised by SymPy trying to work with ndarray: + only Python cmath and then vectorize complex128 + + When using Python cmath there is no need for evalf or float/complex + because Python cmath calls those. + + This function never tries to mix numpy directly with evalf because numpy + does not understand SymPy Float. If this is needed one can use the + float_wrap_evalf/complex_wrap_evalf options of experimental_lambdify or + better one can be explicit about the dtypes that numpy works with. + Check numpy bug http://projects.scipy.org/numpy/ticket/1013 to know what + types of errors to expect. + """ + def __init__(self, args, expr): + self.args = args + self.expr = expr + self.np = import_module('numpy') + + self.lambda_func_1 = experimental_lambdify( + args, expr, use_np=True) + self.vector_func_1 = self.lambda_func_1 + + self.lambda_func_2 = experimental_lambdify( + args, expr, use_python_cmath=True) + self.vector_func_2 = self.np.vectorize( + self.lambda_func_2, otypes=[complex]) + + self.vector_func = self.vector_func_1 + self.failure = False + + def __call__(self, *args): + np = self.np + + try: + temp_args = (np.array(a, dtype=complex) for a in args) + results = self.vector_func(*temp_args) + results = np.ma.masked_where( + np.abs(results.imag) > 1e-7 * np.abs(results), + results.real, copy=False) + return results + except ValueError: + if self.failure: + raise + + self.failure = True + self.vector_func = self.vector_func_2 + warnings.warn( + 'The evaluation of the expression is problematic. ' + 'We are trying a failback method that may still work. ' + 'Please report this as a bug.') + return self.__call__(*args) + + +class lambdify: + """Returns the lambdified function. + + Explanation + =========== + + This function uses experimental_lambdify to create a lambdified + expression. It uses cmath to lambdify the expression. If the function + is not implemented in Python cmath, Python cmath calls evalf on those + functions. + """ + + def __init__(self, args, expr): + self.args = args + self.expr = expr + self.lambda_func_1 = experimental_lambdify( + args, expr, use_python_cmath=True, use_evalf=True) + self.lambda_func_2 = experimental_lambdify( + args, expr, use_python_math=True, use_evalf=True) + self.lambda_func_3 = experimental_lambdify( + args, expr, use_evalf=True, complex_wrap_evalf=True) + self.lambda_func = self.lambda_func_1 + self.failure = False + + def __call__(self, args): + try: + #The result can be sympy.Float. Hence wrap it with complex type. + result = complex(self.lambda_func(args)) + if abs(result.imag) > 1e-7 * abs(result): + return None + return result.real + except (ZeroDivisionError, OverflowError): + return None + except TypeError as e: + if self.failure: + raise e + + if self.lambda_func == self.lambda_func_1: + self.lambda_func = self.lambda_func_2 + return self.__call__(args) + + self.failure = True + self.lambda_func = self.lambda_func_3 + warnings.warn( + 'The evaluation of the expression is problematic. ' + 'We are trying a failback method that may still work. ' + 'Please report this as a bug.', stacklevel=2) + return self.__call__(args) + + +def experimental_lambdify(*args, **kwargs): + l = Lambdifier(*args, **kwargs) + return l + + +class Lambdifier: + def __init__(self, args, expr, print_lambda=False, use_evalf=False, + float_wrap_evalf=False, complex_wrap_evalf=False, + use_np=False, use_python_math=False, use_python_cmath=False, + use_interval=False): + + self.print_lambda = print_lambda + self.use_evalf = use_evalf + self.float_wrap_evalf = float_wrap_evalf + self.complex_wrap_evalf = complex_wrap_evalf + self.use_np = use_np + self.use_python_math = use_python_math + self.use_python_cmath = use_python_cmath + self.use_interval = use_interval + + # Constructing the argument string + # - check + if not all(isinstance(a, Symbol) for a in args): + raise ValueError('The arguments must be Symbols.') + # - use numbered symbols + syms = numbered_symbols(exclude=expr.free_symbols) + newargs = [next(syms) for _ in args] + expr = expr.xreplace(dict(zip(args, newargs))) + argstr = ', '.join([str(a) for a in newargs]) + del syms, newargs, args + + # Constructing the translation dictionaries and making the translation + self.dict_str = self.get_dict_str() + self.dict_fun = self.get_dict_fun() + exprstr = str(expr) + newexpr = self.tree2str_translate(self.str2tree(exprstr)) + + # Constructing the namespaces + namespace = {} + namespace.update(self.sympy_atoms_namespace(expr)) + namespace.update(self.sympy_expression_namespace(expr)) + # XXX Workaround + # Ugly workaround because Pow(a,Half) prints as sqrt(a) + # and sympy_expression_namespace can not catch it. + from sympy.functions.elementary.miscellaneous import sqrt + namespace.update({'sqrt': sqrt}) + namespace.update({'Eq': lambda x, y: x == y}) + namespace.update({'Ne': lambda x, y: x != y}) + # End workaround. + if use_python_math: + namespace.update({'math': __import__('math')}) + if use_python_cmath: + namespace.update({'cmath': __import__('cmath')}) + if use_np: + try: + namespace.update({'np': __import__('numpy')}) + except ImportError: + raise ImportError( + 'experimental_lambdify failed to import numpy.') + if use_interval: + namespace.update({'imath': __import__( + 'sympy.plotting.intervalmath', fromlist=['intervalmath'])}) + namespace.update({'math': __import__('math')}) + + # Construct the lambda + if self.print_lambda: + print(newexpr) + eval_str = 'lambda %s : ( %s )' % (argstr, newexpr) + self.eval_str = eval_str + exec("MYNEWLAMBDA = %s" % eval_str, namespace) + self.lambda_func = namespace['MYNEWLAMBDA'] + + def __call__(self, *args, **kwargs): + return self.lambda_func(*args, **kwargs) + + + ############################################################################## + # Dicts for translating from SymPy to other modules + ############################################################################## + ### + # builtins + ### + # Functions with different names in builtins + builtin_functions_different = { + 'Min': 'min', + 'Max': 'max', + 'Abs': 'abs', + } + + # Strings that should be translated + builtin_not_functions = { + 'I': '1j', +# 'oo': '1e400', + } + + ### + # numpy + ### + + # Functions that are the same in numpy + numpy_functions_same = [ + 'sin', 'cos', 'tan', 'sinh', 'cosh', 'tanh', 'exp', 'log', + 'sqrt', 'floor', 'conjugate', 'sign', + ] + + # Functions with different names in numpy + numpy_functions_different = { + "acos": "arccos", + "acosh": "arccosh", + "arg": "angle", + "asin": "arcsin", + "asinh": "arcsinh", + "atan": "arctan", + "atan2": "arctan2", + "atanh": "arctanh", + "ceiling": "ceil", + "im": "imag", + "ln": "log", + "Max": "amax", + "Min": "amin", + "re": "real", + "Abs": "abs", + } + + # Strings that should be translated + numpy_not_functions = { + 'pi': 'np.pi', + 'oo': 'np.inf', + 'E': 'np.e', + } + + ### + # Python math + ### + + # Functions that are the same in math + math_functions_same = [ + 'sin', 'cos', 'tan', 'asin', 'acos', 'atan', 'atan2', + 'sinh', 'cosh', 'tanh', 'asinh', 'acosh', 'atanh', + 'exp', 'log', 'erf', 'sqrt', 'floor', 'factorial', 'gamma', + ] + + # Functions with different names in math + math_functions_different = { + 'ceiling': 'ceil', + 'ln': 'log', + 'loggamma': 'lgamma' + } + + # Strings that should be translated + math_not_functions = { + 'pi': 'math.pi', + 'E': 'math.e', + } + + ### + # Python cmath + ### + + # Functions that are the same in cmath + cmath_functions_same = [ + 'sin', 'cos', 'tan', 'asin', 'acos', 'atan', + 'sinh', 'cosh', 'tanh', 'asinh', 'acosh', 'atanh', + 'exp', 'log', 'sqrt', + ] + + # Functions with different names in cmath + cmath_functions_different = { + 'ln': 'log', + 'arg': 'phase', + } + + # Strings that should be translated + cmath_not_functions = { + 'pi': 'cmath.pi', + 'E': 'cmath.e', + } + + ### + # intervalmath + ### + + interval_not_functions = { + 'pi': 'math.pi', + 'E': 'math.e' + } + + interval_functions_same = [ + 'sin', 'cos', 'exp', 'tan', 'atan', 'log', + 'sqrt', 'cosh', 'sinh', 'tanh', 'floor', + 'acos', 'asin', 'acosh', 'asinh', 'atanh', + 'Abs', 'And', 'Or' + ] + + interval_functions_different = { + 'Min': 'imin', + 'Max': 'imax', + 'ceiling': 'ceil', + + } + + ### + # mpmath, etc + ### + #TODO + + ### + # Create the final ordered tuples of dictionaries + ### + + # For strings + def get_dict_str(self): + dict_str = dict(self.builtin_not_functions) + if self.use_np: + dict_str.update(self.numpy_not_functions) + if self.use_python_math: + dict_str.update(self.math_not_functions) + if self.use_python_cmath: + dict_str.update(self.cmath_not_functions) + if self.use_interval: + dict_str.update(self.interval_not_functions) + return dict_str + + # For functions + def get_dict_fun(self): + dict_fun = dict(self.builtin_functions_different) + if self.use_np: + for s in self.numpy_functions_same: + dict_fun[s] = 'np.' + s + for k, v in self.numpy_functions_different.items(): + dict_fun[k] = 'np.' + v + if self.use_python_math: + for s in self.math_functions_same: + dict_fun[s] = 'math.' + s + for k, v in self.math_functions_different.items(): + dict_fun[k] = 'math.' + v + if self.use_python_cmath: + for s in self.cmath_functions_same: + dict_fun[s] = 'cmath.' + s + for k, v in self.cmath_functions_different.items(): + dict_fun[k] = 'cmath.' + v + if self.use_interval: + for s in self.interval_functions_same: + dict_fun[s] = 'imath.' + s + for k, v in self.interval_functions_different.items(): + dict_fun[k] = 'imath.' + v + return dict_fun + + ############################################################################## + # The translator functions, tree parsers, etc. + ############################################################################## + + def str2tree(self, exprstr): + """Converts an expression string to a tree. + + Explanation + =========== + + Functions are represented by ('func_name(', tree_of_arguments). + Other expressions are (head_string, mid_tree, tail_str). + Expressions that do not contain functions are directly returned. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy import Integral, sin + >>> from sympy.plotting.experimental_lambdify import Lambdifier + >>> str2tree = Lambdifier([x], x).str2tree + + >>> str2tree(str(Integral(x, (x, 1, y)))) + ('', ('Integral(', 'x, (x, 1, y)'), ')') + >>> str2tree(str(x+y)) + 'x + y' + >>> str2tree(str(x+y*sin(z)+1)) + ('x + y*', ('sin(', 'z'), ') + 1') + >>> str2tree('sin(y*(y + 1.1) + (sin(y)))') + ('', ('sin(', ('y*(y + 1.1) + (', ('sin(', 'y'), '))')), ')') + """ + #matches the first 'function_name(' + first_par = re.search(r'(\w+\()', exprstr) + if first_par is None: + return exprstr + else: + start = first_par.start() + end = first_par.end() + head = exprstr[:start] + func = exprstr[start:end] + tail = exprstr[end:] + count = 0 + for i, c in enumerate(tail): + if c == '(': + count += 1 + elif c == ')': + count -= 1 + if count == -1: + break + func_tail = self.str2tree(tail[:i]) + tail = self.str2tree(tail[i:]) + return (head, (func, func_tail), tail) + + @classmethod + def tree2str(cls, tree): + """Converts a tree to string without translations. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy import sin + >>> from sympy.plotting.experimental_lambdify import Lambdifier + >>> str2tree = Lambdifier([x], x).str2tree + >>> tree2str = Lambdifier([x], x).tree2str + + >>> tree2str(str2tree(str(x+y*sin(z)+1))) + 'x + y*sin(z) + 1' + """ + if isinstance(tree, str): + return tree + else: + return ''.join(map(cls.tree2str, tree)) + + def tree2str_translate(self, tree): + """Converts a tree to string with translations. + + Explanation + =========== + + Function names are translated by translate_func. + Other strings are translated by translate_str. + """ + if isinstance(tree, str): + return self.translate_str(tree) + elif isinstance(tree, tuple) and len(tree) == 2: + return self.translate_func(tree[0][:-1], tree[1]) + else: + return ''.join([self.tree2str_translate(t) for t in tree]) + + def translate_str(self, estr): + """Translate substrings of estr using in order the dictionaries in + dict_tuple_str.""" + for pattern, repl in self.dict_str.items(): + estr = re.sub(pattern, repl, estr) + return estr + + def translate_func(self, func_name, argtree): + """Translate function names and the tree of arguments. + + Explanation + =========== + + If the function name is not in the dictionaries of dict_tuple_fun then the + function is surrounded by a float((...).evalf()). + + The use of float is necessary as np.(sympy.Float(..)) raises an + error.""" + if func_name in self.dict_fun: + new_name = self.dict_fun[func_name] + argstr = self.tree2str_translate(argtree) + return new_name + '(' + argstr + elif func_name in ['Eq', 'Ne']: + op = {'Eq': '==', 'Ne': '!='} + return "(lambda x, y: x {} y)({}".format(op[func_name], self.tree2str_translate(argtree)) + else: + template = '(%s(%s)).evalf(' if self.use_evalf else '%s(%s' + if self.float_wrap_evalf: + template = 'float(%s)' % template + elif self.complex_wrap_evalf: + template = 'complex(%s)' % template + + # Wrapping should only happen on the outermost expression, which + # is the only thing we know will be a number. + float_wrap_evalf = self.float_wrap_evalf + complex_wrap_evalf = self.complex_wrap_evalf + self.float_wrap_evalf = False + self.complex_wrap_evalf = False + ret = template % (func_name, self.tree2str_translate(argtree)) + self.float_wrap_evalf = float_wrap_evalf + self.complex_wrap_evalf = complex_wrap_evalf + return ret + + ############################################################################## + # The namespace constructors + ############################################################################## + + @classmethod + def sympy_expression_namespace(cls, expr): + """Traverses the (func, args) tree of an expression and creates a SymPy + namespace. All other modules are imported only as a module name. That way + the namespace is not polluted and rests quite small. It probably causes much + more variable lookups and so it takes more time, but there are no tests on + that for the moment.""" + if expr is None: + return {} + else: + funcname = str(expr.func) + # XXX Workaround + # Here we add an ugly workaround because str(func(x)) + # is not always the same as str(func). Eg + # >>> str(Integral(x)) + # "Integral(x)" + # >>> str(Integral) + # "" + # >>> str(sqrt(x)) + # "sqrt(x)" + # >>> str(sqrt) + # "" + # >>> str(sin(x)) + # "sin(x)" + # >>> str(sin) + # "sin" + # Either one of those can be used but not all at the same time. + # The code considers the sin example as the right one. + regexlist = [ + r'$', + # the example Integral + r'$', # the example sqrt + ] + for r in regexlist: + m = re.match(r, funcname) + if m is not None: + funcname = m.groups()[0] + # End of the workaround + # XXX debug: print funcname + args_dict = {} + for a in expr.args: + if (isinstance(a, (Symbol, NumberSymbol)) or a in [I, zoo, oo]): + continue + else: + args_dict.update(cls.sympy_expression_namespace(a)) + args_dict.update({funcname: expr.func}) + return args_dict + + @staticmethod + def sympy_atoms_namespace(expr): + """For no real reason this function is separated from + sympy_expression_namespace. It can be moved to it.""" + atoms = expr.atoms(Symbol, NumberSymbol, I, zoo, oo) + d = {} + for a in atoms: + # XXX debug: print 'atom:' + str(a) + d[str(a)] = a + return d diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..fb9a6a57f94e931f0c5f5b3dda7b0b6fd31841f4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__init__.py @@ -0,0 +1,12 @@ +from .interval_arithmetic import interval +from .lib_interval import (Abs, exp, log, log10, sin, cos, tan, sqrt, + imin, imax, sinh, cosh, tanh, acosh, asinh, atanh, + asin, acos, atan, ceil, floor, And, Or) + +__all__ = [ + 'interval', + + 'Abs', 'exp', 'log', 'log10', 'sin', 'cos', 'tan', 'sqrt', 'imin', 'imax', + 'sinh', 'cosh', 'tanh', 'acosh', 'asinh', 'atanh', 'asin', 'acos', 'atan', + 'ceil', 'floor', 'And', 'Or', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..01a8896110997886af5cb962a52db9c6cc177f66 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_arithmetic.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_arithmetic.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..7b44434d6e167d79874340a237129345d0cdbbbe Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_arithmetic.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_membership.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_membership.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..c5b9fde3d019c3a6c62407ef773ed6ca95c9f651 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/interval_membership.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/lib_interval.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/lib_interval.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..c04a048c30cd38490ebef61197b94204653dc1df Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/__pycache__/lib_interval.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_arithmetic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_arithmetic.py new file mode 100644 index 0000000000000000000000000000000000000000..fc5c0e2ef118c7cf4f80de53a3590de11130410e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_arithmetic.py @@ -0,0 +1,413 @@ +""" +Interval Arithmetic for plotting. +This module does not implement interval arithmetic accurately and +hence cannot be used for purposes other than plotting. If you want +to use interval arithmetic, use mpmath's interval arithmetic. + +The module implements interval arithmetic using numpy and +python floating points. The rounding up and down is not handled +and hence this is not an accurate implementation of interval +arithmetic. + +The module uses numpy for speed which cannot be achieved with mpmath. +""" + +# Q: Why use numpy? Why not simply use mpmath's interval arithmetic? +# A: mpmath's interval arithmetic simulates a floating point unit +# and hence is slow, while numpy evaluations are orders of magnitude +# faster. + +# Q: Why create a separate class for intervals? Why not use SymPy's +# Interval Sets? +# A: The functionalities that will be required for plotting is quite +# different from what Interval Sets implement. + +# Q: Why is rounding up and down according to IEEE754 not handled? +# A: It is not possible to do it in both numpy and python. An external +# library has to used, which defeats the whole purpose i.e., speed. Also +# rounding is handled for very few functions in those libraries. + +# Q Will my plots be affected? +# A It will not affect most of the plots. The interval arithmetic +# module based suffers the same problems as that of floating point +# arithmetic. + +from sympy.core.numbers import int_valued +from sympy.core.logic import fuzzy_and +from sympy.simplify.simplify import nsimplify + +from .interval_membership import intervalMembership + + +class interval: + """ Represents an interval containing floating points as start and + end of the interval + The is_valid variable tracks whether the interval obtained as the + result of the function is in the domain and is continuous. + - True: Represents the interval result of a function is continuous and + in the domain of the function. + - False: The interval argument of the function was not in the domain of + the function, hence the is_valid of the result interval is False + - None: The function was not continuous over the interval or + the function's argument interval is partly in the domain of the + function + + A comparison between an interval and a real number, or a + comparison between two intervals may return ``intervalMembership`` + of two 3-valued logic values. + """ + + def __init__(self, *args, is_valid=True, **kwargs): + self.is_valid = is_valid + if len(args) == 1: + if isinstance(args[0], interval): + self.start, self.end = args[0].start, args[0].end + else: + self.start = float(args[0]) + self.end = float(args[0]) + elif len(args) == 2: + if args[0] < args[1]: + self.start = float(args[0]) + self.end = float(args[1]) + else: + self.start = float(args[1]) + self.end = float(args[0]) + + else: + raise ValueError("interval takes a maximum of two float values " + "as arguments") + + @property + def mid(self): + return (self.start + self.end) / 2.0 + + @property + def width(self): + return self.end - self.start + + def __repr__(self): + return "interval(%f, %f)" % (self.start, self.end) + + def __str__(self): + return "[%f, %f]" % (self.start, self.end) + + def __lt__(self, other): + if isinstance(other, (int, float)): + if self.end < other: + return intervalMembership(True, self.is_valid) + elif self.start > other: + return intervalMembership(False, self.is_valid) + else: + return intervalMembership(None, self.is_valid) + + elif isinstance(other, interval): + valid = fuzzy_and([self.is_valid, other.is_valid]) + if self.end < other. start: + return intervalMembership(True, valid) + if self.start > other.end: + return intervalMembership(False, valid) + return intervalMembership(None, valid) + else: + return NotImplemented + + def __gt__(self, other): + if isinstance(other, (int, float)): + if self.start > other: + return intervalMembership(True, self.is_valid) + elif self.end < other: + return intervalMembership(False, self.is_valid) + else: + return intervalMembership(None, self.is_valid) + elif isinstance(other, interval): + return other.__lt__(self) + else: + return NotImplemented + + def __eq__(self, other): + if isinstance(other, (int, float)): + if self.start == other and self.end == other: + return intervalMembership(True, self.is_valid) + if other in self: + return intervalMembership(None, self.is_valid) + else: + return intervalMembership(False, self.is_valid) + + if isinstance(other, interval): + valid = fuzzy_and([self.is_valid, other.is_valid]) + if self.start == other.start and self.end == other.end: + return intervalMembership(True, valid) + elif self.__lt__(other)[0] is not None: + return intervalMembership(False, valid) + else: + return intervalMembership(None, valid) + else: + return NotImplemented + + def __ne__(self, other): + if isinstance(other, (int, float)): + if self.start == other and self.end == other: + return intervalMembership(False, self.is_valid) + if other in self: + return intervalMembership(None, self.is_valid) + else: + return intervalMembership(True, self.is_valid) + + if isinstance(other, interval): + valid = fuzzy_and([self.is_valid, other.is_valid]) + if self.start == other.start and self.end == other.end: + return intervalMembership(False, valid) + if not self.__lt__(other)[0] is None: + return intervalMembership(True, valid) + return intervalMembership(None, valid) + else: + return NotImplemented + + def __le__(self, other): + if isinstance(other, (int, float)): + if self.end <= other: + return intervalMembership(True, self.is_valid) + if self.start > other: + return intervalMembership(False, self.is_valid) + else: + return intervalMembership(None, self.is_valid) + + if isinstance(other, interval): + valid = fuzzy_and([self.is_valid, other.is_valid]) + if self.end <= other.start: + return intervalMembership(True, valid) + if self.start > other.end: + return intervalMembership(False, valid) + return intervalMembership(None, valid) + else: + return NotImplemented + + def __ge__(self, other): + if isinstance(other, (int, float)): + if self.start >= other: + return intervalMembership(True, self.is_valid) + elif self.end < other: + return intervalMembership(False, self.is_valid) + else: + return intervalMembership(None, self.is_valid) + elif isinstance(other, interval): + return other.__le__(self) + + def __add__(self, other): + if isinstance(other, (int, float)): + if self.is_valid: + return interval(self.start + other, self.end + other) + else: + start = self.start + other + end = self.end + other + return interval(start, end, is_valid=self.is_valid) + + elif isinstance(other, interval): + start = self.start + other.start + end = self.end + other.end + valid = fuzzy_and([self.is_valid, other.is_valid]) + return interval(start, end, is_valid=valid) + else: + return NotImplemented + + __radd__ = __add__ + + def __sub__(self, other): + if isinstance(other, (int, float)): + start = self.start - other + end = self.end - other + return interval(start, end, is_valid=self.is_valid) + + elif isinstance(other, interval): + start = self.start - other.end + end = self.end - other.start + valid = fuzzy_and([self.is_valid, other.is_valid]) + return interval(start, end, is_valid=valid) + else: + return NotImplemented + + def __rsub__(self, other): + if isinstance(other, (int, float)): + start = other - self.end + end = other - self.start + return interval(start, end, is_valid=self.is_valid) + elif isinstance(other, interval): + return other.__sub__(self) + else: + return NotImplemented + + def __neg__(self): + if self.is_valid: + return interval(-self.end, -self.start) + else: + return interval(-self.end, -self.start, is_valid=self.is_valid) + + def __mul__(self, other): + if isinstance(other, interval): + if self.is_valid is False or other.is_valid is False: + return interval(-float('inf'), float('inf'), is_valid=False) + elif self.is_valid is None or other.is_valid is None: + return interval(-float('inf'), float('inf'), is_valid=None) + else: + inters = [] + inters.append(self.start * other.start) + inters.append(self.end * other.start) + inters.append(self.start * other.end) + inters.append(self.end * other.end) + start = min(inters) + end = max(inters) + return interval(start, end) + elif isinstance(other, (int, float)): + return interval(self.start*other, self.end*other, is_valid=self.is_valid) + else: + return NotImplemented + + __rmul__ = __mul__ + + def __contains__(self, other): + if isinstance(other, (int, float)): + return self.start <= other and self.end >= other + else: + return self.start <= other.start and other.end <= self.end + + def __rtruediv__(self, other): + if isinstance(other, (int, float)): + other = interval(other) + return other.__truediv__(self) + elif isinstance(other, interval): + return other.__truediv__(self) + else: + return NotImplemented + + def __truediv__(self, other): + # Both None and False are handled + if not self.is_valid: + # Don't divide as the value is not valid + return interval(-float('inf'), float('inf'), is_valid=self.is_valid) + if isinstance(other, (int, float)): + if other == 0: + # Divide by zero encountered. valid nowhere + return interval(-float('inf'), float('inf'), is_valid=False) + else: + return interval(self.start / other, self.end / other) + + elif isinstance(other, interval): + if other.is_valid is False or self.is_valid is False: + return interval(-float('inf'), float('inf'), is_valid=False) + elif other.is_valid is None or self.is_valid is None: + return interval(-float('inf'), float('inf'), is_valid=None) + else: + # denominator contains both signs, i.e. being divided by zero + # return the whole real line with is_valid = None + if 0 in other: + return interval(-float('inf'), float('inf'), is_valid=None) + + # denominator negative + this = self + if other.end < 0: + this = -this + other = -other + + # denominator positive + inters = [] + inters.append(this.start / other.start) + inters.append(this.end / other.start) + inters.append(this.start / other.end) + inters.append(this.end / other.end) + start = max(inters) + end = min(inters) + return interval(start, end) + else: + return NotImplemented + + def __pow__(self, other): + # Implements only power to an integer. + from .lib_interval import exp, log + if not self.is_valid: + return self + if isinstance(other, interval): + return exp(other * log(self)) + elif isinstance(other, (float, int)): + if other < 0: + return 1 / self.__pow__(abs(other)) + else: + if int_valued(other): + return _pow_int(self, other) + else: + return _pow_float(self, other) + else: + return NotImplemented + + def __rpow__(self, other): + if isinstance(other, (float, int)): + if not self.is_valid: + #Don't do anything + return self + elif other < 0: + if self.width > 0: + return interval(-float('inf'), float('inf'), is_valid=False) + else: + power_rational = nsimplify(self.start) + num, denom = power_rational.as_numer_denom() + if denom % 2 == 0: + return interval(-float('inf'), float('inf'), + is_valid=False) + else: + start = -abs(other)**self.start + end = start + return interval(start, end) + else: + return interval(other**self.start, other**self.end) + elif isinstance(other, interval): + return other.__pow__(self) + else: + return NotImplemented + + def __hash__(self): + return hash((self.is_valid, self.start, self.end)) + + +def _pow_float(inter, power): + """Evaluates an interval raised to a floating point.""" + power_rational = nsimplify(power) + num, denom = power_rational.as_numer_denom() + if num % 2 == 0: + start = abs(inter.start)**power + end = abs(inter.end)**power + if start < 0: + ret = interval(0, max(start, end)) + else: + ret = interval(start, end) + return ret + elif denom % 2 == 0: + if inter.end < 0: + return interval(-float('inf'), float('inf'), is_valid=False) + elif inter.start < 0: + return interval(0, inter.end**power, is_valid=None) + else: + return interval(inter.start**power, inter.end**power) + else: + if inter.start < 0: + start = -abs(inter.start)**power + else: + start = inter.start**power + + if inter.end < 0: + end = -abs(inter.end)**power + else: + end = inter.end**power + + return interval(start, end, is_valid=inter.is_valid) + + +def _pow_int(inter, power): + """Evaluates an interval raised to an integer power""" + power = int(power) + if power & 1: + return interval(inter.start**power, inter.end**power) + else: + if inter.start < 0 and inter.end > 0: + start = 0 + end = max(inter.start**power, inter.end**power) + return interval(start, end) + else: + return interval(inter.start**power, inter.end**power) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_membership.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_membership.py new file mode 100644 index 0000000000000000000000000000000000000000..c4887c2d96f0d006b95a8e207a4f4a75940aec23 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/interval_membership.py @@ -0,0 +1,78 @@ +from sympy.core.logic import fuzzy_and, fuzzy_or, fuzzy_not, fuzzy_xor + + +class intervalMembership: + """Represents a boolean expression returned by the comparison of + the interval object. + + Parameters + ========== + + (a, b) : (bool, bool) + The first value determines the comparison as follows: + - True: If the comparison is True throughout the intervals. + - False: If the comparison is False throughout the intervals. + - None: If the comparison is True for some part of the intervals. + + The second value is determined as follows: + - True: If both the intervals in comparison are valid. + - False: If at least one of the intervals is False, else + - None + """ + def __init__(self, a, b): + self._wrapped = (a, b) + + def __getitem__(self, i): + try: + return self._wrapped[i] + except IndexError: + raise IndexError( + "{} must be a valid indexing for the 2-tuple." + .format(i)) + + def __len__(self): + return 2 + + def __iter__(self): + return iter(self._wrapped) + + def __str__(self): + return "intervalMembership({}, {})".format(*self) + __repr__ = __str__ + + def __and__(self, other): + if not isinstance(other, intervalMembership): + raise ValueError( + "The comparison is not supported for {}.".format(other)) + + a1, b1 = self + a2, b2 = other + return intervalMembership(fuzzy_and([a1, a2]), fuzzy_and([b1, b2])) + + def __or__(self, other): + if not isinstance(other, intervalMembership): + raise ValueError( + "The comparison is not supported for {}.".format(other)) + + a1, b1 = self + a2, b2 = other + return intervalMembership(fuzzy_or([a1, a2]), fuzzy_and([b1, b2])) + + def __invert__(self): + a, b = self + return intervalMembership(fuzzy_not(a), b) + + def __xor__(self, other): + if not isinstance(other, intervalMembership): + raise ValueError( + "The comparison is not supported for {}.".format(other)) + + a1, b1 = self + a2, b2 = other + return intervalMembership(fuzzy_xor([a1, a2]), fuzzy_and([b1, b2])) + + def __eq__(self, other): + return self._wrapped == other + + def __ne__(self, other): + return self._wrapped != other diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/lib_interval.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/lib_interval.py new file mode 100644 index 0000000000000000000000000000000000000000..7549a05820d747ce057892f8df1fbcbc61cc3f43 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/lib_interval.py @@ -0,0 +1,452 @@ +""" The module contains implemented functions for interval arithmetic.""" +from functools import reduce + +from sympy.plotting.intervalmath import interval +from sympy.external import import_module + + +def Abs(x): + if isinstance(x, (int, float)): + return interval(abs(x)) + elif isinstance(x, interval): + if x.start < 0 and x.end > 0: + return interval(0, max(abs(x.start), abs(x.end)), is_valid=x.is_valid) + else: + return interval(abs(x.start), abs(x.end)) + else: + raise NotImplementedError + +#Monotonic + + +def exp(x): + """evaluates the exponential of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.exp(x), np.exp(x)) + elif isinstance(x, interval): + return interval(np.exp(x.start), np.exp(x.end), is_valid=x.is_valid) + else: + raise NotImplementedError + + +#Monotonic +def log(x): + """evaluates the natural logarithm of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + if x <= 0: + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.log(x)) + elif isinstance(x, interval): + if not x.is_valid: + return interval(-np.inf, np.inf, is_valid=x.is_valid) + elif x.end <= 0: + return interval(-np.inf, np.inf, is_valid=False) + elif x.start <= 0: + return interval(-np.inf, np.inf, is_valid=None) + + return interval(np.log(x.start), np.log(x.end)) + else: + raise NotImplementedError + + +#Monotonic +def log10(x): + """evaluates the logarithm to the base 10 of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + if x <= 0: + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.log10(x)) + elif isinstance(x, interval): + if not x.is_valid: + return interval(-np.inf, np.inf, is_valid=x.is_valid) + elif x.end <= 0: + return interval(-np.inf, np.inf, is_valid=False) + elif x.start <= 0: + return interval(-np.inf, np.inf, is_valid=None) + return interval(np.log10(x.start), np.log10(x.end)) + else: + raise NotImplementedError + + +#Monotonic +def atan(x): + """evaluates the tan inverse of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.arctan(x)) + elif isinstance(x, interval): + start = np.arctan(x.start) + end = np.arctan(x.end) + return interval(start, end, is_valid=x.is_valid) + else: + raise NotImplementedError + + +#periodic +def sin(x): + """evaluates the sine of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.sin(x)) + elif isinstance(x, interval): + if not x.is_valid: + return interval(-1, 1, is_valid=x.is_valid) + na, __ = divmod(x.start, np.pi / 2.0) + nb, __ = divmod(x.end, np.pi / 2.0) + start = min(np.sin(x.start), np.sin(x.end)) + end = max(np.sin(x.start), np.sin(x.end)) + if nb - na > 4: + return interval(-1, 1, is_valid=x.is_valid) + elif na == nb: + return interval(start, end, is_valid=x.is_valid) + else: + if (na - 1) // 4 != (nb - 1) // 4: + #sin has max + end = 1 + if (na - 3) // 4 != (nb - 3) // 4: + #sin has min + start = -1 + return interval(start, end) + else: + raise NotImplementedError + + +#periodic +def cos(x): + """Evaluates the cos of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.sin(x)) + elif isinstance(x, interval): + if not (np.isfinite(x.start) and np.isfinite(x.end)): + return interval(-1, 1, is_valid=x.is_valid) + na, __ = divmod(x.start, np.pi / 2.0) + nb, __ = divmod(x.end, np.pi / 2.0) + start = min(np.cos(x.start), np.cos(x.end)) + end = max(np.cos(x.start), np.cos(x.end)) + if nb - na > 4: + #differ more than 2*pi + return interval(-1, 1, is_valid=x.is_valid) + elif na == nb: + #in the same quadarant + return interval(start, end, is_valid=x.is_valid) + else: + if (na) // 4 != (nb) // 4: + #cos has max + end = 1 + if (na - 2) // 4 != (nb - 2) // 4: + #cos has min + start = -1 + return interval(start, end, is_valid=x.is_valid) + else: + raise NotImplementedError + + +def tan(x): + """Evaluates the tan of an interval""" + return sin(x) / cos(x) + + +#Monotonic +def sqrt(x): + """Evaluates the square root of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + if x > 0: + return interval(np.sqrt(x)) + else: + return interval(-np.inf, np.inf, is_valid=False) + elif isinstance(x, interval): + #Outside the domain + if x.end < 0: + return interval(-np.inf, np.inf, is_valid=False) + #Partially outside the domain + elif x.start < 0: + return interval(-np.inf, np.inf, is_valid=None) + else: + return interval(np.sqrt(x.start), np.sqrt(x.end), + is_valid=x.is_valid) + else: + raise NotImplementedError + + +def imin(*args): + """Evaluates the minimum of a list of intervals""" + np = import_module('numpy') + if not all(isinstance(arg, (int, float, interval)) for arg in args): + return NotImplementedError + else: + new_args = [a for a in args if isinstance(a, (int, float)) + or a.is_valid] + if len(new_args) == 0: + if all(a.is_valid is False for a in args): + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(-np.inf, np.inf, is_valid=None) + start_array = [a if isinstance(a, (int, float)) else a.start + for a in new_args] + + end_array = [a if isinstance(a, (int, float)) else a.end + for a in new_args] + return interval(min(start_array), min(end_array)) + + +def imax(*args): + """Evaluates the maximum of a list of intervals""" + np = import_module('numpy') + if not all(isinstance(arg, (int, float, interval)) for arg in args): + return NotImplementedError + else: + new_args = [a for a in args if isinstance(a, (int, float)) + or a.is_valid] + if len(new_args) == 0: + if all(a.is_valid is False for a in args): + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(-np.inf, np.inf, is_valid=None) + start_array = [a if isinstance(a, (int, float)) else a.start + for a in new_args] + + end_array = [a if isinstance(a, (int, float)) else a.end + for a in new_args] + + return interval(max(start_array), max(end_array)) + + +#Monotonic +def sinh(x): + """Evaluates the hyperbolic sine of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.sinh(x), np.sinh(x)) + elif isinstance(x, interval): + return interval(np.sinh(x.start), np.sinh(x.end), is_valid=x.is_valid) + else: + raise NotImplementedError + + +def cosh(x): + """Evaluates the hyperbolic cos of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.cosh(x), np.cosh(x)) + elif isinstance(x, interval): + #both signs + if x.start < 0 and x.end > 0: + end = max(np.cosh(x.start), np.cosh(x.end)) + return interval(1, end, is_valid=x.is_valid) + else: + #Monotonic + start = np.cosh(x.start) + end = np.cosh(x.end) + return interval(start, end, is_valid=x.is_valid) + else: + raise NotImplementedError + + +#Monotonic +def tanh(x): + """Evaluates the hyperbolic tan of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.tanh(x), np.tanh(x)) + elif isinstance(x, interval): + return interval(np.tanh(x.start), np.tanh(x.end), is_valid=x.is_valid) + else: + raise NotImplementedError + + +def asin(x): + """Evaluates the inverse sine of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + #Outside the domain + if abs(x) > 1: + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.arcsin(x), np.arcsin(x)) + elif isinstance(x, interval): + #Outside the domain + if x.is_valid is False or x.start > 1 or x.end < -1: + return interval(-np.inf, np.inf, is_valid=False) + #Partially outside the domain + elif x.start < -1 or x.end > 1: + return interval(-np.inf, np.inf, is_valid=None) + else: + start = np.arcsin(x.start) + end = np.arcsin(x.end) + return interval(start, end, is_valid=x.is_valid) + + +def acos(x): + """Evaluates the inverse cos of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + if abs(x) > 1: + #Outside the domain + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.arccos(x), np.arccos(x)) + elif isinstance(x, interval): + #Outside the domain + if x.is_valid is False or x.start > 1 or x.end < -1: + return interval(-np.inf, np.inf, is_valid=False) + #Partially outside the domain + elif x.start < -1 or x.end > 1: + return interval(-np.inf, np.inf, is_valid=None) + else: + start = np.arccos(x.start) + end = np.arccos(x.end) + return interval(start, end, is_valid=x.is_valid) + + +def ceil(x): + """Evaluates the ceiling of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.ceil(x)) + elif isinstance(x, interval): + if x.is_valid is False: + return interval(-np.inf, np.inf, is_valid=False) + else: + start = np.ceil(x.start) + end = np.ceil(x.end) + #Continuous over the interval + if start == end: + return interval(start, end, is_valid=x.is_valid) + else: + #Not continuous over the interval + return interval(start, end, is_valid=None) + else: + return NotImplementedError + + +def floor(x): + """Evaluates the floor of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.floor(x)) + elif isinstance(x, interval): + if x.is_valid is False: + return interval(-np.inf, np.inf, is_valid=False) + else: + start = np.floor(x.start) + end = np.floor(x.end) + #continuous over the argument + if start == end: + return interval(start, end, is_valid=x.is_valid) + else: + #not continuous over the interval + return interval(start, end, is_valid=None) + else: + return NotImplementedError + + +def acosh(x): + """Evaluates the inverse hyperbolic cosine of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + #Outside the domain + if x < 1: + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.arccosh(x)) + elif isinstance(x, interval): + #Outside the domain + if x.end < 1: + return interval(-np.inf, np.inf, is_valid=False) + #Partly outside the domain + elif x.start < 1: + return interval(-np.inf, np.inf, is_valid=None) + else: + start = np.arccosh(x.start) + end = np.arccosh(x.end) + return interval(start, end, is_valid=x.is_valid) + else: + return NotImplementedError + + +#Monotonic +def asinh(x): + """Evaluates the inverse hyperbolic sine of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + return interval(np.arcsinh(x)) + elif isinstance(x, interval): + start = np.arcsinh(x.start) + end = np.arcsinh(x.end) + return interval(start, end, is_valid=x.is_valid) + else: + return NotImplementedError + + +def atanh(x): + """Evaluates the inverse hyperbolic tangent of an interval""" + np = import_module('numpy') + if isinstance(x, (int, float)): + #Outside the domain + if abs(x) >= 1: + return interval(-np.inf, np.inf, is_valid=False) + else: + return interval(np.arctanh(x)) + elif isinstance(x, interval): + #outside the domain + if x.is_valid is False or x.start >= 1 or x.end <= -1: + return interval(-np.inf, np.inf, is_valid=False) + #partly outside the domain + elif x.start <= -1 or x.end >= 1: + return interval(-np.inf, np.inf, is_valid=None) + else: + start = np.arctanh(x.start) + end = np.arctanh(x.end) + return interval(start, end, is_valid=x.is_valid) + else: + return NotImplementedError + + +#Three valued logic for interval plotting. + +def And(*args): + """Defines the three valued ``And`` behaviour for a 2-tuple of + three valued logic values""" + def reduce_and(cmp_intervala, cmp_intervalb): + if cmp_intervala[0] is False or cmp_intervalb[0] is False: + first = False + elif cmp_intervala[0] is None or cmp_intervalb[0] is None: + first = None + else: + first = True + if cmp_intervala[1] is False or cmp_intervalb[1] is False: + second = False + elif cmp_intervala[1] is None or cmp_intervalb[1] is None: + second = None + else: + second = True + return (first, second) + return reduce(reduce_and, args) + + +def Or(*args): + """Defines the three valued ``Or`` behaviour for a 2-tuple of + three valued logic values""" + def reduce_or(cmp_intervala, cmp_intervalb): + if cmp_intervala[0] is True or cmp_intervalb[0] is True: + first = True + elif cmp_intervala[0] is None or cmp_intervalb[0] is None: + first = None + else: + first = False + + if cmp_intervala[1] is True or cmp_intervalb[1] is True: + second = True + elif cmp_intervala[1] is None or cmp_intervalb[1] is None: + second = None + else: + second = False + return (first, second) + return reduce(reduce_or, args) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_functions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_functions.py new file mode 100644 index 0000000000000000000000000000000000000000..861c3660df024d3fbec788a027708348e9929655 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_functions.py @@ -0,0 +1,415 @@ +from sympy.external import import_module +from sympy.plotting.intervalmath import ( + Abs, acos, acosh, And, asin, asinh, atan, atanh, ceil, cos, cosh, + exp, floor, imax, imin, interval, log, log10, Or, sin, sinh, sqrt, + tan, tanh, +) + +np = import_module('numpy') +if not np: + disabled = True + + +#requires Numpy. Hence included in interval_functions + + +def test_interval_pow(): + a = 2**interval(1, 2) == interval(2, 4) + assert a == (True, True) + a = interval(1, 2)**interval(1, 2) == interval(1, 4) + assert a == (True, True) + a = interval(-1, 1)**interval(0.5, 2) + assert a.is_valid is None + a = interval(-2, -1) ** interval(1, 2) + assert a.is_valid is False + a = interval(-2, -1) ** (1.0 / 2) + assert a.is_valid is False + a = interval(-1, 1)**(1.0 / 2) + assert a.is_valid is None + a = interval(-1, 1)**(1.0 / 3) == interval(-1, 1) + assert a == (True, True) + a = interval(-1, 1)**2 == interval(0, 1) + assert a == (True, True) + a = interval(-1, 1) ** (1.0 / 29) == interval(-1, 1) + assert a == (True, True) + a = -2**interval(1, 1) == interval(-2, -2) + assert a == (True, True) + + a = interval(1, 2, is_valid=False)**2 + assert a.is_valid is False + + a = (-3)**interval(1, 2) + assert a.is_valid is False + a = (-4)**interval(0.5, 0.5) + assert a.is_valid is False + assert ((-3)**interval(1, 1) == interval(-3, -3)) == (True, True) + + a = interval(8, 64)**(2.0 / 3) + assert abs(a.start - 4) < 1e-10 # eps + assert abs(a.end - 16) < 1e-10 + a = interval(-8, 64)**(2.0 / 3) + assert abs(a.start - 4) < 1e-10 # eps + assert abs(a.end - 16) < 1e-10 + + +def test_exp(): + a = exp(interval(-np.inf, 0)) + assert a.start == np.exp(-np.inf) + assert a.end == np.exp(0) + a = exp(interval(1, 2)) + assert a.start == np.exp(1) + assert a.end == np.exp(2) + a = exp(1) + assert a.start == np.exp(1) + assert a.end == np.exp(1) + + +def test_log(): + a = log(interval(1, 2)) + assert a.start == 0 + assert a.end == np.log(2) + a = log(interval(-1, 1)) + assert a.is_valid is None + a = log(interval(-3, -1)) + assert a.is_valid is False + a = log(-3) + assert a.is_valid is False + a = log(2) + assert a.start == np.log(2) + assert a.end == np.log(2) + + +def test_log10(): + a = log10(interval(1, 2)) + assert a.start == 0 + assert a.end == np.log10(2) + a = log10(interval(-1, 1)) + assert a.is_valid is None + a = log10(interval(-3, -1)) + assert a.is_valid is False + a = log10(-3) + assert a.is_valid is False + a = log10(2) + assert a.start == np.log10(2) + assert a.end == np.log10(2) + + +def test_atan(): + a = atan(interval(0, 1)) + assert a.start == np.arctan(0) + assert a.end == np.arctan(1) + a = atan(1) + assert a.start == np.arctan(1) + assert a.end == np.arctan(1) + + +def test_sin(): + a = sin(interval(0, np.pi / 4)) + assert a.start == np.sin(0) + assert a.end == np.sin(np.pi / 4) + + a = sin(interval(-np.pi / 4, np.pi / 4)) + assert a.start == np.sin(-np.pi / 4) + assert a.end == np.sin(np.pi / 4) + + a = sin(interval(np.pi / 4, 3 * np.pi / 4)) + assert a.start == np.sin(np.pi / 4) + assert a.end == 1 + + a = sin(interval(7 * np.pi / 6, 7 * np.pi / 4)) + assert a.start == -1 + assert a.end == np.sin(7 * np.pi / 6) + + a = sin(interval(0, 3 * np.pi)) + assert a.start == -1 + assert a.end == 1 + + a = sin(interval(np.pi / 3, 7 * np.pi / 4)) + assert a.start == -1 + assert a.end == 1 + + a = sin(np.pi / 4) + assert a.start == np.sin(np.pi / 4) + assert a.end == np.sin(np.pi / 4) + + a = sin(interval(1, 2, is_valid=False)) + assert a.is_valid is False + + +def test_cos(): + a = cos(interval(0, np.pi / 4)) + assert a.start == np.cos(np.pi / 4) + assert a.end == 1 + + a = cos(interval(-np.pi / 4, np.pi / 4)) + assert a.start == np.cos(-np.pi / 4) + assert a.end == 1 + + a = cos(interval(np.pi / 4, 3 * np.pi / 4)) + assert a.start == np.cos(3 * np.pi / 4) + assert a.end == np.cos(np.pi / 4) + + a = cos(interval(3 * np.pi / 4, 5 * np.pi / 4)) + assert a.start == -1 + assert a.end == np.cos(3 * np.pi / 4) + + a = cos(interval(0, 3 * np.pi)) + assert a.start == -1 + assert a.end == 1 + + a = cos(interval(- np.pi / 3, 5 * np.pi / 4)) + assert a.start == -1 + assert a.end == 1 + + a = cos(interval(1, 2, is_valid=False)) + assert a.is_valid is False + + +def test_tan(): + a = tan(interval(0, np.pi / 4)) + assert a.start == 0 + # must match lib_interval definition of tan: + assert a.end == np.sin(np.pi / 4)/np.cos(np.pi / 4) + + a = tan(interval(np.pi / 4, 3 * np.pi / 4)) + #discontinuity + assert a.is_valid is None + + +def test_sqrt(): + a = sqrt(interval(1, 4)) + assert a.start == 1 + assert a.end == 2 + + a = sqrt(interval(0.01, 1)) + assert a.start == np.sqrt(0.01) + assert a.end == 1 + + a = sqrt(interval(-1, 1)) + assert a.is_valid is None + + a = sqrt(interval(-3, -1)) + assert a.is_valid is False + + a = sqrt(4) + assert (a == interval(2, 2)) == (True, True) + + a = sqrt(-3) + assert a.is_valid is False + + +def test_imin(): + a = imin(interval(1, 3), interval(2, 5), interval(-1, 3)) + assert a.start == -1 + assert a.end == 3 + + a = imin(-2, interval(1, 4)) + assert a.start == -2 + assert a.end == -2 + + a = imin(5, interval(3, 4), interval(-2, 2, is_valid=False)) + assert a.start == 3 + assert a.end == 4 + + +def test_imax(): + a = imax(interval(-2, 2), interval(2, 7), interval(-3, 9)) + assert a.start == 2 + assert a.end == 9 + + a = imax(8, interval(1, 4)) + assert a.start == 8 + assert a.end == 8 + + a = imax(interval(1, 2), interval(3, 4), interval(-2, 2, is_valid=False)) + assert a.start == 3 + assert a.end == 4 + + +def test_sinh(): + a = sinh(interval(-1, 1)) + assert a.start == np.sinh(-1) + assert a.end == np.sinh(1) + + a = sinh(1) + assert a.start == np.sinh(1) + assert a.end == np.sinh(1) + + +def test_cosh(): + a = cosh(interval(1, 2)) + assert a.start == np.cosh(1) + assert a.end == np.cosh(2) + a = cosh(interval(-2, -1)) + assert a.start == np.cosh(-1) + assert a.end == np.cosh(-2) + + a = cosh(interval(-2, 1)) + assert a.start == 1 + assert a.end == np.cosh(-2) + + a = cosh(1) + assert a.start == np.cosh(1) + assert a.end == np.cosh(1) + + +def test_tanh(): + a = tanh(interval(-3, 3)) + assert a.start == np.tanh(-3) + assert a.end == np.tanh(3) + + a = tanh(3) + assert a.start == np.tanh(3) + assert a.end == np.tanh(3) + + +def test_asin(): + a = asin(interval(-0.5, 0.5)) + assert a.start == np.arcsin(-0.5) + assert a.end == np.arcsin(0.5) + + a = asin(interval(-1.5, 1.5)) + assert a.is_valid is None + a = asin(interval(-2, -1.5)) + assert a.is_valid is False + + a = asin(interval(0, 2)) + assert a.is_valid is None + + a = asin(interval(2, 5)) + assert a.is_valid is False + + a = asin(0.5) + assert a.start == np.arcsin(0.5) + assert a.end == np.arcsin(0.5) + + a = asin(1.5) + assert a.is_valid is False + + +def test_acos(): + a = acos(interval(-0.5, 0.5)) + assert a.start == np.arccos(0.5) + assert a.end == np.arccos(-0.5) + + a = acos(interval(-1.5, 1.5)) + assert a.is_valid is None + a = acos(interval(-2, -1.5)) + assert a.is_valid is False + + a = acos(interval(0, 2)) + assert a.is_valid is None + + a = acos(interval(2, 5)) + assert a.is_valid is False + + a = acos(0.5) + assert a.start == np.arccos(0.5) + assert a.end == np.arccos(0.5) + + a = acos(1.5) + assert a.is_valid is False + + +def test_ceil(): + a = ceil(interval(0.2, 0.5)) + assert a.start == 1 + assert a.end == 1 + + a = ceil(interval(0.5, 1.5)) + assert a.start == 1 + assert a.end == 2 + assert a.is_valid is None + + a = ceil(interval(-5, 5)) + assert a.is_valid is None + + a = ceil(5.4) + assert a.start == 6 + assert a.end == 6 + + +def test_floor(): + a = floor(interval(0.2, 0.5)) + assert a.start == 0 + assert a.end == 0 + + a = floor(interval(0.5, 1.5)) + assert a.start == 0 + assert a.end == 1 + assert a.is_valid is None + + a = floor(interval(-5, 5)) + assert a.is_valid is None + + a = floor(5.4) + assert a.start == 5 + assert a.end == 5 + + +def test_asinh(): + a = asinh(interval(1, 2)) + assert a.start == np.arcsinh(1) + assert a.end == np.arcsinh(2) + + a = asinh(0.5) + assert a.start == np.arcsinh(0.5) + assert a.end == np.arcsinh(0.5) + + +def test_acosh(): + a = acosh(interval(3, 5)) + assert a.start == np.arccosh(3) + assert a.end == np.arccosh(5) + + a = acosh(interval(0, 3)) + assert a.is_valid is None + a = acosh(interval(-3, 0.5)) + assert a.is_valid is False + + a = acosh(0.5) + assert a.is_valid is False + + a = acosh(2) + assert a.start == np.arccosh(2) + assert a.end == np.arccosh(2) + + +def test_atanh(): + a = atanh(interval(-0.5, 0.5)) + assert a.start == np.arctanh(-0.5) + assert a.end == np.arctanh(0.5) + + a = atanh(interval(0, 3)) + assert a.is_valid is None + + a = atanh(interval(-3, -2)) + assert a.is_valid is False + + a = atanh(0.5) + assert a.start == np.arctanh(0.5) + assert a.end == np.arctanh(0.5) + + a = atanh(1.5) + assert a.is_valid is False + + +def test_Abs(): + assert (Abs(interval(-0.5, 0.5)) == interval(0, 0.5)) == (True, True) + assert (Abs(interval(-3, -2)) == interval(2, 3)) == (True, True) + assert (Abs(-3) == interval(3, 3)) == (True, True) + + +def test_And(): + args = [(True, True), (True, False), (True, None)] + assert And(*args) == (True, False) + + args = [(False, True), (None, None), (True, True)] + assert And(*args) == (False, None) + + +def test_Or(): + args = [(True, True), (True, False), (False, None)] + assert Or(*args) == (True, True) + args = [(None, None), (False, None), (False, False)] + assert Or(*args) == (None, None) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_membership.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_membership.py new file mode 100644 index 0000000000000000000000000000000000000000..7b7f23680d60a64a6257a84c2476e31a8b5dfce8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_interval_membership.py @@ -0,0 +1,150 @@ +from sympy.core.symbol import Symbol +from sympy.plotting.intervalmath import interval +from sympy.plotting.intervalmath.interval_membership import intervalMembership +from sympy.plotting.experimental_lambdify import experimental_lambdify +from sympy.testing.pytest import raises + + +def test_creation(): + assert intervalMembership(True, True) + raises(TypeError, lambda: intervalMembership(True)) + raises(TypeError, lambda: intervalMembership(True, True, True)) + + +def test_getitem(): + a = intervalMembership(True, False) + assert a[0] is True + assert a[1] is False + raises(IndexError, lambda: a[2]) + + +def test_str(): + a = intervalMembership(True, False) + assert str(a) == 'intervalMembership(True, False)' + assert repr(a) == 'intervalMembership(True, False)' + + +def test_equivalence(): + a = intervalMembership(True, True) + b = intervalMembership(True, False) + assert (a == b) is False + assert (a != b) is True + + a = intervalMembership(True, False) + b = intervalMembership(True, False) + assert (a == b) is True + assert (a != b) is False + + +def test_not(): + x = Symbol('x') + + r1 = x > -1 + r2 = x <= -1 + + i = interval + + f1 = experimental_lambdify((x,), r1) + f2 = experimental_lambdify((x,), r2) + + tt = i(-0.1, 0.1, is_valid=True) + tn = i(-0.1, 0.1, is_valid=None) + tf = i(-0.1, 0.1, is_valid=False) + + assert f1(tt) == ~f2(tt) + assert f1(tn) == ~f2(tn) + assert f1(tf) == ~f2(tf) + + nt = i(0.9, 1.1, is_valid=True) + nn = i(0.9, 1.1, is_valid=None) + nf = i(0.9, 1.1, is_valid=False) + + assert f1(nt) == ~f2(nt) + assert f1(nn) == ~f2(nn) + assert f1(nf) == ~f2(nf) + + ft = i(1.9, 2.1, is_valid=True) + fn = i(1.9, 2.1, is_valid=None) + ff = i(1.9, 2.1, is_valid=False) + + assert f1(ft) == ~f2(ft) + assert f1(fn) == ~f2(fn) + assert f1(ff) == ~f2(ff) + + +def test_boolean(): + # There can be 9*9 test cases in full mapping of the cartesian product. + # But we only consider 3*3 cases for simplicity. + s = [ + intervalMembership(False, False), + intervalMembership(None, None), + intervalMembership(True, True) + ] + + # Reduced tests for 'And' + a1 = [ + intervalMembership(False, False), + intervalMembership(False, False), + intervalMembership(False, False), + intervalMembership(False, False), + intervalMembership(None, None), + intervalMembership(None, None), + intervalMembership(False, False), + intervalMembership(None, None), + intervalMembership(True, True) + ] + a1_iter = iter(a1) + for i in range(len(s)): + for j in range(len(s)): + assert s[i] & s[j] == next(a1_iter) + + # Reduced tests for 'Or' + a1 = [ + intervalMembership(False, False), + intervalMembership(None, False), + intervalMembership(True, False), + intervalMembership(None, False), + intervalMembership(None, None), + intervalMembership(True, None), + intervalMembership(True, False), + intervalMembership(True, None), + intervalMembership(True, True) + ] + a1_iter = iter(a1) + for i in range(len(s)): + for j in range(len(s)): + assert s[i] | s[j] == next(a1_iter) + + # Reduced tests for 'Xor' + a1 = [ + intervalMembership(False, False), + intervalMembership(None, False), + intervalMembership(True, False), + intervalMembership(None, False), + intervalMembership(None, None), + intervalMembership(None, None), + intervalMembership(True, False), + intervalMembership(None, None), + intervalMembership(False, True) + ] + a1_iter = iter(a1) + for i in range(len(s)): + for j in range(len(s)): + assert s[i] ^ s[j] == next(a1_iter) + + # Reduced tests for 'Not' + a1 = [ + intervalMembership(True, False), + intervalMembership(None, None), + intervalMembership(False, True) + ] + a1_iter = iter(a1) + for i in range(len(s)): + assert ~s[i] == next(a1_iter) + + +def test_boolean_errors(): + a = intervalMembership(True, True) + raises(ValueError, lambda: a & 1) + raises(ValueError, lambda: a | 1) + raises(ValueError, lambda: a ^ 1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_intervalmath.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_intervalmath.py new file mode 100644 index 0000000000000000000000000000000000000000..e30f217a44b4ea795270c0e2c66b6813b05e63ea --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/intervalmath/tests/test_intervalmath.py @@ -0,0 +1,213 @@ +from sympy.plotting.intervalmath import interval +from sympy.testing.pytest import raises + + +def test_interval(): + assert (interval(1, 1) == interval(1, 1, is_valid=True)) == (True, True) + assert (interval(1, 1) == interval(1, 1, is_valid=False)) == (True, False) + assert (interval(1, 1) == interval(1, 1, is_valid=None)) == (True, None) + assert (interval(1, 1.5) == interval(1, 2)) == (None, True) + assert (interval(0, 1) == interval(2, 3)) == (False, True) + assert (interval(0, 1) == interval(1, 2)) == (None, True) + assert (interval(1, 2) != interval(1, 2)) == (False, True) + assert (interval(1, 3) != interval(2, 3)) == (None, True) + assert (interval(1, 3) != interval(-5, -3)) == (True, True) + assert ( + interval(1, 3, is_valid=False) != interval(-5, -3)) == (True, False) + assert (interval(1, 3, is_valid=None) != interval(-5, 3)) == (None, None) + assert (interval(4, 4) != 4) == (False, True) + assert (interval(1, 1) == 1) == (True, True) + assert (interval(1, 3, is_valid=False) == interval(1, 3)) == (True, False) + assert (interval(1, 3, is_valid=None) == interval(1, 3)) == (True, None) + inter = interval(-5, 5) + assert (interval(inter) == interval(-5, 5)) == (True, True) + assert inter.width == 10 + assert 0 in inter + assert -5 in inter + assert 5 in inter + assert interval(0, 3) in inter + assert interval(-6, 2) not in inter + assert -5.05 not in inter + assert 5.3 not in inter + interb = interval(-float('inf'), float('inf')) + assert 0 in inter + assert inter in interb + assert interval(0, float('inf')) in interb + assert interval(-float('inf'), 5) in interb + assert interval(-1e50, 1e50) in interb + assert ( + -interval(-1, -2, is_valid=False) == interval(1, 2)) == (True, False) + raises(ValueError, lambda: interval(1, 2, 3)) + + +def test_interval_add(): + assert (interval(1, 2) + interval(2, 3) == interval(3, 5)) == (True, True) + assert (1 + interval(1, 2) == interval(2, 3)) == (True, True) + assert (interval(1, 2) + 1 == interval(2, 3)) == (True, True) + compare = (1 + interval(0, float('inf')) == interval(1, float('inf'))) + assert compare == (True, True) + a = 1 + interval(2, 5, is_valid=False) + assert a.is_valid is False + a = 1 + interval(2, 5, is_valid=None) + assert a.is_valid is None + a = interval(2, 5, is_valid=False) + interval(3, 5, is_valid=None) + assert a.is_valid is False + a = interval(3, 5) + interval(-1, 1, is_valid=None) + assert a.is_valid is None + a = interval(2, 5, is_valid=False) + 1 + assert a.is_valid is False + + +def test_interval_sub(): + assert (interval(1, 2) - interval(1, 5) == interval(-4, 1)) == (True, True) + assert (interval(1, 2) - 1 == interval(0, 1)) == (True, True) + assert (1 - interval(1, 2) == interval(-1, 0)) == (True, True) + a = 1 - interval(1, 2, is_valid=False) + assert a.is_valid is False + a = interval(1, 4, is_valid=None) - 1 + assert a.is_valid is None + a = interval(1, 3, is_valid=False) - interval(1, 3) + assert a.is_valid is False + a = interval(1, 3, is_valid=None) - interval(1, 3) + assert a.is_valid is None + + +def test_interval_inequality(): + assert (interval(1, 2) < interval(3, 4)) == (True, True) + assert (interval(1, 2) < interval(2, 4)) == (None, True) + assert (interval(1, 2) < interval(-2, 0)) == (False, True) + assert (interval(1, 2) <= interval(2, 4)) == (True, True) + assert (interval(1, 2) <= interval(1.5, 6)) == (None, True) + assert (interval(2, 3) <= interval(1, 2)) == (None, True) + assert (interval(2, 3) <= interval(1, 1.5)) == (False, True) + assert ( + interval(1, 2, is_valid=False) <= interval(-2, 0)) == (False, False) + assert (interval(1, 2, is_valid=None) <= interval(-2, 0)) == (False, None) + assert (interval(1, 2) <= 1.5) == (None, True) + assert (interval(1, 2) <= 3) == (True, True) + assert (interval(1, 2) <= 0) == (False, True) + assert (interval(5, 8) > interval(2, 3)) == (True, True) + assert (interval(2, 5) > interval(1, 3)) == (None, True) + assert (interval(2, 3) > interval(3.1, 5)) == (False, True) + + assert (interval(-1, 1) == 0) == (None, True) + assert (interval(-1, 1) == 2) == (False, True) + assert (interval(-1, 1) != 0) == (None, True) + assert (interval(-1, 1) != 2) == (True, True) + + assert (interval(3, 5) > 2) == (True, True) + assert (interval(3, 5) < 2) == (False, True) + assert (interval(1, 5) < 2) == (None, True) + assert (interval(1, 5) > 2) == (None, True) + assert (interval(0, 1) > 2) == (False, True) + assert (interval(1, 2) >= interval(0, 1)) == (True, True) + assert (interval(1, 2) >= interval(0, 1.5)) == (None, True) + assert (interval(1, 2) >= interval(3, 4)) == (False, True) + assert (interval(1, 2) >= 0) == (True, True) + assert (interval(1, 2) >= 1.2) == (None, True) + assert (interval(1, 2) >= 3) == (False, True) + assert (2 > interval(0, 1)) == (True, True) + a = interval(-1, 1, is_valid=False) < interval(2, 5, is_valid=None) + assert a == (True, False) + a = interval(-1, 1, is_valid=None) < interval(2, 5, is_valid=False) + assert a == (True, False) + a = interval(-1, 1, is_valid=None) < interval(2, 5, is_valid=None) + assert a == (True, None) + a = interval(-1, 1, is_valid=False) > interval(-5, -2, is_valid=None) + assert a == (True, False) + a = interval(-1, 1, is_valid=None) > interval(-5, -2, is_valid=False) + assert a == (True, False) + a = interval(-1, 1, is_valid=None) > interval(-5, -2, is_valid=None) + assert a == (True, None) + + +def test_interval_mul(): + assert ( + interval(1, 5) * interval(2, 10) == interval(2, 50)) == (True, True) + a = interval(-1, 1) * interval(2, 10) == interval(-10, 10) + assert a == (True, True) + + a = interval(-1, 1) * interval(-5, 3) == interval(-5, 5) + assert a == (True, True) + + assert (interval(1, 3) * 2 == interval(2, 6)) == (True, True) + assert (3 * interval(-1, 2) == interval(-3, 6)) == (True, True) + + a = 3 * interval(1, 2, is_valid=False) + assert a.is_valid is False + + a = 3 * interval(1, 2, is_valid=None) + assert a.is_valid is None + + a = interval(1, 5, is_valid=False) * interval(1, 2, is_valid=None) + assert a.is_valid is False + + +def test_interval_div(): + div = interval(1, 2, is_valid=False) / 3 + assert div == interval(-float('inf'), float('inf'), is_valid=False) + + div = interval(1, 2, is_valid=None) / 3 + assert div == interval(-float('inf'), float('inf'), is_valid=None) + + div = 3 / interval(1, 2, is_valid=None) + assert div == interval(-float('inf'), float('inf'), is_valid=None) + a = interval(1, 2) / 0 + assert a.is_valid is False + a = interval(0.5, 1) / interval(-1, 0) + assert a.is_valid is None + a = interval(0, 1) / interval(0, 1) + assert a.is_valid is None + + a = interval(-1, 1) / interval(-1, 1) + assert a.is_valid is None + + a = interval(-1, 2) / interval(0.5, 1) == interval(-2.0, 4.0) + assert a == (True, True) + a = interval(0, 1) / interval(0.5, 1) == interval(0.0, 2.0) + assert a == (True, True) + a = interval(-1, 0) / interval(0.5, 1) == interval(-2.0, 0.0) + assert a == (True, True) + a = interval(-0.5, -0.25) / interval(0.5, 1) == interval(-1.0, -0.25) + assert a == (True, True) + a = interval(0.5, 1) / interval(0.5, 1) == interval(0.5, 2.0) + assert a == (True, True) + a = interval(0.5, 4) / interval(0.5, 1) == interval(0.5, 8.0) + assert a == (True, True) + a = interval(-1, -0.5) / interval(0.5, 1) == interval(-2.0, -0.5) + assert a == (True, True) + a = interval(-4, -0.5) / interval(0.5, 1) == interval(-8.0, -0.5) + assert a == (True, True) + a = interval(-1, 2) / interval(-2, -0.5) == interval(-4.0, 2.0) + assert a == (True, True) + a = interval(0, 1) / interval(-2, -0.5) == interval(-2.0, 0.0) + assert a == (True, True) + a = interval(-1, 0) / interval(-2, -0.5) == interval(0.0, 2.0) + assert a == (True, True) + a = interval(-0.5, -0.25) / interval(-2, -0.5) == interval(0.125, 1.0) + assert a == (True, True) + a = interval(0.5, 1) / interval(-2, -0.5) == interval(-2.0, -0.25) + assert a == (True, True) + a = interval(0.5, 4) / interval(-2, -0.5) == interval(-8.0, -0.25) + assert a == (True, True) + a = interval(-1, -0.5) / interval(-2, -0.5) == interval(0.25, 2.0) + assert a == (True, True) + a = interval(-4, -0.5) / interval(-2, -0.5) == interval(0.25, 8.0) + assert a == (True, True) + a = interval(-5, 5, is_valid=False) / 2 + assert a.is_valid is False + +def test_hashable(): + ''' + test that interval objects are hashable. + this is required in order to be able to put them into the cache, which + appears to be necessary for plotting in py3k. For details, see: + + https://github.com/sympy/sympy/pull/2101 + https://github.com/sympy/sympy/issues/6533 + ''' + hash(interval(1, 1)) + hash(interval(1, 1, is_valid=True)) + hash(interval(-4, -0.5)) + hash(interval(-2, -0.5)) + hash(interval(0.25, 8.0)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot.py new file mode 100644 index 0000000000000000000000000000000000000000..50029392a1ac70491f93f28c4d443da15e7fc31e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot.py @@ -0,0 +1,1234 @@ +"""Plotting module for SymPy. + +A plot is represented by the ``Plot`` class that contains a reference to the +backend and a list of the data series to be plotted. The data series are +instances of classes meant to simplify getting points and meshes from SymPy +expressions. ``plot_backends`` is a dictionary with all the backends. + +This module gives only the essential. For all the fancy stuff use directly +the backend. You can get the backend wrapper for every plot from the +``_backend`` attribute. Moreover the data series classes have various useful +methods like ``get_points``, ``get_meshes``, etc, that may +be useful if you wish to use another plotting library. + +Especially if you need publication ready graphs and this module is not enough +for you - just get the ``_backend`` attribute and add whatever you want +directly to it. In the case of matplotlib (the common way to graph data in +python) just copy ``_backend.fig`` which is the figure and ``_backend.ax`` +which is the axis and work on them as you would on any other matplotlib object. + +Simplicity of code takes much greater importance than performance. Do not use it +if you care at all about performance. A new backend instance is initialized +every time you call ``show()`` and the old one is left to the garbage collector. +""" + +from sympy.concrete.summations import Sum +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.function import Function, AppliedUndef +from sympy.core.symbol import (Dummy, Symbol, Wild) +from sympy.external import import_module +from sympy.functions import sign +from sympy.plotting.backends.base_backend import Plot +from sympy.plotting.backends.matplotlibbackend import MatplotlibBackend +from sympy.plotting.backends.textbackend import TextBackend +from sympy.plotting.series import ( + LineOver1DRangeSeries, Parametric2DLineSeries, Parametric3DLineSeries, + ParametricSurfaceSeries, SurfaceOver2DRangeSeries, ContourSeries) +from sympy.plotting.utils import _check_arguments, _plot_sympify +from sympy.tensor.indexed import Indexed +# to maintain back-compatibility +from sympy.plotting.plotgrid import PlotGrid # noqa: F401 +from sympy.plotting.series import BaseSeries # noqa: F401 +from sympy.plotting.series import Line2DBaseSeries # noqa: F401 +from sympy.plotting.series import Line3DBaseSeries # noqa: F401 +from sympy.plotting.series import SurfaceBaseSeries # noqa: F401 +from sympy.plotting.series import List2DSeries # noqa: F401 +from sympy.plotting.series import GenericDataSeries # noqa: F401 +from sympy.plotting.series import centers_of_faces # noqa: F401 +from sympy.plotting.series import centers_of_segments # noqa: F401 +from sympy.plotting.series import flat # noqa: F401 +from sympy.plotting.backends.base_backend import unset_show # noqa: F401 +from sympy.plotting.backends.matplotlibbackend import _matplotlib_list # noqa: F401 +from sympy.plotting.textplot import textplot # noqa: F401 + + +__doctest_requires__ = { + ('plot3d', + 'plot3d_parametric_line', + 'plot3d_parametric_surface', + 'plot_parametric'): ['matplotlib'], + # XXX: The plot doctest possibly should not require matplotlib. It fails at + # plot(x**2, (x, -5, 5)) which should be fine for text backend. + ('plot',): ['matplotlib'], +} + + +def _process_summations(sum_bound, *args): + """Substitute oo (infinity) in the lower/upper bounds of a summation with + some integer number. + + Parameters + ========== + + sum_bound : int + oo will be substituted with this integer number. + *args : list/tuple + pre-processed arguments of the form (expr, range, ...) + + Notes + ===== + Let's consider the following summation: ``Sum(1 / x**2, (x, 1, oo))``. + The current implementation of lambdify (SymPy 1.12 at the time of + writing this) will create something of this form: + ``sum(1 / x**2 for x in range(1, INF))`` + The problem is that ``type(INF)`` is float, while ``range`` requires + integers: the evaluation fails. + Instead of modifying ``lambdify`` (which requires a deep knowledge), just + replace it with some integer number. + """ + def new_bound(t, bound): + if (not t.is_number) or t.is_finite: + return t + if sign(t) >= 0: + return bound + return -bound + + args = list(args) + expr = args[0] + + # select summations whose lower/upper bound is infinity + w = Wild("w", properties=[ + lambda t: isinstance(t, Sum), + lambda t: any((not a[1].is_finite) or (not a[2].is_finite) for i, a in enumerate(t.args) if i > 0) + ]) + + for t in list(expr.find(w)): + sums_args = list(t.args) + for i, a in enumerate(sums_args): + if i > 0: + sums_args[i] = (a[0], new_bound(a[1], sum_bound), + new_bound(a[2], sum_bound)) + s = Sum(*sums_args) + expr = expr.subs(t, s) + args[0] = expr + return args + + +def _build_line_series(*args, **kwargs): + """Loop over the provided arguments and create the necessary line series. + """ + series = [] + sum_bound = int(kwargs.get("sum_bound", 1000)) + for arg in args: + expr, r, label, rendering_kw = arg + kw = kwargs.copy() + if rendering_kw is not None: + kw["rendering_kw"] = rendering_kw + # TODO: _process_piecewise check goes here + if not callable(expr): + arg = _process_summations(sum_bound, *arg) + series.append(LineOver1DRangeSeries(*arg[:-1], **kw)) + return series + + +def _create_series(series_type, plot_expr, **kwargs): + """Extract the rendering_kw dictionary from the provided arguments and + create an appropriate data series. + """ + series = [] + for args in plot_expr: + kw = kwargs.copy() + if args[-1] is not None: + kw["rendering_kw"] = args[-1] + series.append(series_type(*args[:-1], **kw)) + return series + + +def _set_labels(series, labels, rendering_kw): + """Apply the `label` and `rendering_kw` keyword arguments to the series. + """ + if not isinstance(labels, (list, tuple)): + labels = [labels] + if len(labels) > 0: + if len(labels) == 1 and len(series) > 1: + # if one label is provided and multiple series are being plotted, + # set the same label to all data series. It maintains + # back-compatibility + labels *= len(series) + if len(series) != len(labels): + raise ValueError("The number of labels must be equal to the " + "number of expressions being plotted.\nReceived " + f"{len(series)} expressions and {len(labels)} labels") + + for s, l in zip(series, labels): + s.label = l + + if rendering_kw: + if isinstance(rendering_kw, dict): + rendering_kw = [rendering_kw] + if len(rendering_kw) == 1: + rendering_kw *= len(series) + elif len(series) != len(rendering_kw): + raise ValueError("The number of rendering dictionaries must be " + "equal to the number of expressions being plotted.\nReceived " + f"{len(series)} expressions and {len(labels)} labels") + for s, r in zip(series, rendering_kw): + s.rendering_kw = r + + +def plot_factory(*args, **kwargs): + backend = kwargs.pop("backend", "default") + if isinstance(backend, str): + if backend == "default": + matplotlib = import_module('matplotlib', + min_module_version='1.1.0', catch=(RuntimeError,)) + if matplotlib: + return MatplotlibBackend(*args, **kwargs) + return TextBackend(*args, **kwargs) + return plot_backends[backend](*args, **kwargs) + elif (type(backend) == type) and issubclass(backend, Plot): + return backend(*args, **kwargs) + else: + raise TypeError("backend must be either a string or a subclass of ``Plot``.") + + +plot_backends = { + 'matplotlib': MatplotlibBackend, + 'text': TextBackend, +} + + +####New API for plotting module #### + +# TODO: Add color arrays for plots. +# TODO: Add more plotting options for 3d plots. +# TODO: Adaptive sampling for 3D plots. + +def plot(*args, show=True, **kwargs): + """Plots a function of a single variable as a curve. + + Parameters + ========== + + args : + The first argument is the expression representing the function + of single variable to be plotted. + + The last argument is a 3-tuple denoting the range of the free + variable. e.g. ``(x, 0, 5)`` + + Typical usage examples are in the following: + + - Plotting a single expression with a single range. + ``plot(expr, range, **kwargs)`` + - Plotting a single expression with the default range (-10, 10). + ``plot(expr, **kwargs)`` + - Plotting multiple expressions with a single range. + ``plot(expr1, expr2, ..., range, **kwargs)`` + - Plotting multiple expressions with multiple ranges. + ``plot((expr1, range1), (expr2, range2), ..., **kwargs)`` + + It is best practice to specify range explicitly because default + range may change in the future if a more advanced default range + detection algorithm is implemented. + + show : bool, optional + The default value is set to ``True``. Set show to ``False`` and + the function will not display the plot. The returned instance of + the ``Plot`` class can then be used to save or display the plot + by calling the ``save()`` and ``show()`` methods respectively. + + line_color : string, or float, or function, optional + Specifies the color for the plot. + See ``Plot`` to see how to set color for the plots. + Note that by setting ``line_color``, it would be applied simultaneously + to all the series. + + title : str, optional + Title of the plot. It is set to the latex representation of + the expression, if the plot has only one expression. + + label : str, optional + The label of the expression in the plot. It will be used when + called with ``legend``. Default is the name of the expression. + e.g. ``sin(x)`` + + xlabel : str or expression, optional + Label for the x-axis. + + ylabel : str or expression, optional + Label for the y-axis. + + xscale : 'linear' or 'log', optional + Sets the scaling of the x-axis. + + yscale : 'linear' or 'log', optional + Sets the scaling of the y-axis. + + axis_center : (float, float), optional + Tuple of two floats denoting the coordinates of the center or + {'center', 'auto'} + + xlim : (float, float), optional + Denotes the x-axis limits, ``(min, max)```. + + ylim : (float, float), optional + Denotes the y-axis limits, ``(min, max)```. + + annotations : list, optional + A list of dictionaries specifying the type of annotation + required. The keys in the dictionary should be equivalent + to the arguments of the :external:mod:`matplotlib`'s + :external:meth:`~matplotlib.axes.Axes.annotate` method. + + markers : list, optional + A list of dictionaries specifying the type the markers required. + The keys in the dictionary should be equivalent to the arguments + of the :external:mod:`matplotlib`'s :external:func:`~matplotlib.pyplot.plot()` function + along with the marker related keyworded arguments. + + rectangles : list, optional + A list of dictionaries specifying the dimensions of the + rectangles to be plotted. The keys in the dictionary should be + equivalent to the arguments of the :external:mod:`matplotlib`'s + :external:class:`~matplotlib.patches.Rectangle` class. + + fill : dict, optional + A dictionary specifying the type of color filling required in + the plot. The keys in the dictionary should be equivalent to the + arguments of the :external:mod:`matplotlib`'s + :external:meth:`~matplotlib.axes.Axes.fill_between` method. + + adaptive : bool, optional + The default value for the ``adaptive`` parameter is now ``False``. + To enable adaptive sampling, set ``adaptive=True`` and specify ``n`` if uniform sampling is required. + + The plotting uses an adaptive algorithm which samples + recursively to accurately plot. The adaptive algorithm uses a + random point near the midpoint of two points that has to be + further sampled. Hence the same plots can appear slightly + different. + + depth : int, optional + Recursion depth of the adaptive algorithm. A depth of value + `n` samples a maximum of `2^{n}` points. + + If the ``adaptive`` flag is set to ``False``, this will be + ignored. + + n : int, optional + Used when the ``adaptive`` is set to ``False``. The function + is uniformly sampled at ``n`` number of points. If the ``adaptive`` + flag is set to ``True``, this will be ignored. + This keyword argument replaces ``nb_of_points``, which should be + considered deprecated. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of + the overall figure. The default value is set to ``None``, meaning + the size will be set by the default backend. + + Examples + ======== + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> from sympy import symbols + >>> from sympy.plotting import plot + >>> x = symbols('x') + + Single Plot + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot(x**2, (x, -5, 5)) + Plot object containing: + [0]: cartesian line: x**2 for x over (-5.0, 5.0) + + Multiple plots with single range. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot(x, x**2, x**3, (x, -5, 5)) + Plot object containing: + [0]: cartesian line: x for x over (-5.0, 5.0) + [1]: cartesian line: x**2 for x over (-5.0, 5.0) + [2]: cartesian line: x**3 for x over (-5.0, 5.0) + + Multiple plots with different ranges. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot((x**2, (x, -6, 6)), (x, (x, -5, 5))) + Plot object containing: + [0]: cartesian line: x**2 for x over (-6.0, 6.0) + [1]: cartesian line: x for x over (-5.0, 5.0) + + No adaptive sampling by default. If adaptive sampling is required, set ``adaptive=True``. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot(x**2, adaptive=True, n=400) + Plot object containing: + [0]: cartesian line: x**2 for x over (-10.0, 10.0) + + See Also + ======== + + Plot, LineOver1DRangeSeries + + """ + args = _plot_sympify(args) + plot_expr = _check_arguments(args, 1, 1, **kwargs) + params = kwargs.get("params", None) + free = set() + for p in plot_expr: + if not isinstance(p[1][0], str): + free |= {p[1][0]} + else: + free |= {Symbol(p[1][0])} + if params: + free = free.difference(params.keys()) + x = free.pop() if free else Symbol("x") + kwargs.setdefault('xlabel', x) + kwargs.setdefault('ylabel', Function('f')(x)) + + labels = kwargs.pop("label", []) + rendering_kw = kwargs.pop("rendering_kw", None) + series = _build_line_series(*plot_expr, **kwargs) + _set_labels(series, labels, rendering_kw) + + plots = plot_factory(*series, **kwargs) + if show: + plots.show() + return plots + + +def plot_parametric(*args, show=True, **kwargs): + """ + Plots a 2D parametric curve. + + Parameters + ========== + + args + Common specifications are: + + - Plotting a single parametric curve with a range + ``plot_parametric((expr_x, expr_y), range)`` + - Plotting multiple parametric curves with the same range + ``plot_parametric((expr_x, expr_y), ..., range)`` + - Plotting multiple parametric curves with different ranges + ``plot_parametric((expr_x, expr_y, range), ...)`` + + ``expr_x`` is the expression representing $x$ component of the + parametric function. + + ``expr_y`` is the expression representing $y$ component of the + parametric function. + + ``range`` is a 3-tuple denoting the parameter symbol, start and + stop. For example, ``(u, 0, 5)``. + + If the range is not specified, then a default range of (-10, 10) + is used. + + However, if the arguments are specified as + ``(expr_x, expr_y, range), ...``, you must specify the ranges + for each expressions manually. + + Default range may change in the future if a more advanced + algorithm is implemented. + + adaptive : bool, optional + Specifies whether to use the adaptive sampling or not. + + The default value is set to ``True``. Set adaptive to ``False`` + and specify ``n`` if uniform sampling is required. + + depth : int, optional + The recursion depth of the adaptive algorithm. A depth of + value $n$ samples a maximum of $2^n$ points. + + n : int, optional + Used when the ``adaptive`` flag is set to ``False``. Specifies the + number of the points used for the uniform sampling. + This keyword argument replaces ``nb_of_points``, which should be + considered deprecated. + + line_color : string, or float, or function, optional + Specifies the color for the plot. + See ``Plot`` to see how to set color for the plots. + Note that by setting ``line_color``, it would be applied simultaneously + to all the series. + + label : str, optional + The label of the expression in the plot. It will be used when + called with ``legend``. Default is the name of the expression. + e.g. ``sin(x)`` + + xlabel : str, optional + Label for the x-axis. + + ylabel : str, optional + Label for the y-axis. + + xscale : 'linear' or 'log', optional + Sets the scaling of the x-axis. + + yscale : 'linear' or 'log', optional + Sets the scaling of the y-axis. + + axis_center : (float, float), optional + Tuple of two floats denoting the coordinates of the center or + {'center', 'auto'} + + xlim : (float, float), optional + Denotes the x-axis limits, ``(min, max)```. + + ylim : (float, float), optional + Denotes the y-axis limits, ``(min, max)```. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of + the overall figure. The default value is set to ``None``, meaning + the size will be set by the default backend. + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import plot_parametric, symbols, cos, sin + >>> u = symbols('u') + + A parametric plot with a single expression: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot_parametric((cos(u), sin(u)), (u, -5, 5)) + Plot object containing: + [0]: parametric cartesian line: (cos(u), sin(u)) for u over (-5.0, 5.0) + + A parametric plot with multiple expressions with the same range: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot_parametric((cos(u), sin(u)), (u, cos(u)), (u, -10, 10)) + Plot object containing: + [0]: parametric cartesian line: (cos(u), sin(u)) for u over (-10.0, 10.0) + [1]: parametric cartesian line: (u, cos(u)) for u over (-10.0, 10.0) + + A parametric plot with multiple expressions with different ranges + for each curve: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot_parametric((cos(u), sin(u), (u, -5, 5)), + ... (cos(u), u, (u, -5, 5))) + Plot object containing: + [0]: parametric cartesian line: (cos(u), sin(u)) for u over (-5.0, 5.0) + [1]: parametric cartesian line: (cos(u), u) for u over (-5.0, 5.0) + + Notes + ===== + + The plotting uses an adaptive algorithm which samples recursively to + accurately plot the curve. The adaptive algorithm uses a random point + near the midpoint of two points that has to be further sampled. + Hence, repeating the same plot command can give slightly different + results because of the random sampling. + + If there are multiple plots, then the same optional arguments are + applied to all the plots drawn in the same canvas. If you want to + set these options separately, you can index the returned ``Plot`` + object and set it. + + For example, when you specify ``line_color`` once, it would be + applied simultaneously to both series. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> from sympy import pi + >>> expr1 = (u, cos(2*pi*u)/2 + 1/2) + >>> expr2 = (u, sin(2*pi*u)/2 + 1/2) + >>> p = plot_parametric(expr1, expr2, (u, 0, 1), line_color='blue') + + If you want to specify the line color for the specific series, you + should index each item and apply the property manually. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p[0].line_color = 'red' + >>> p.show() + + See Also + ======== + + Plot, Parametric2DLineSeries + """ + args = _plot_sympify(args) + plot_expr = _check_arguments(args, 2, 1, **kwargs) + + labels = kwargs.pop("label", []) + rendering_kw = kwargs.pop("rendering_kw", None) + series = _create_series(Parametric2DLineSeries, plot_expr, **kwargs) + _set_labels(series, labels, rendering_kw) + + plots = plot_factory(*series, **kwargs) + if show: + plots.show() + return plots + + +def plot3d_parametric_line(*args, show=True, **kwargs): + """ + Plots a 3D parametric line plot. + + Usage + ===== + + Single plot: + + ``plot3d_parametric_line(expr_x, expr_y, expr_z, range, **kwargs)`` + + If the range is not specified, then a default range of (-10, 10) is used. + + Multiple plots. + + ``plot3d_parametric_line((expr_x, expr_y, expr_z, range), ..., **kwargs)`` + + Ranges have to be specified for every expression. + + Default range may change in the future if a more advanced default range + detection algorithm is implemented. + + Arguments + ========= + + expr_x : Expression representing the function along x. + + expr_y : Expression representing the function along y. + + expr_z : Expression representing the function along z. + + range : (:class:`~.Symbol`, float, float) + A 3-tuple denoting the range of the parameter variable, e.g., (u, 0, 5). + + Keyword Arguments + ================= + + Arguments for ``Parametric3DLineSeries`` class. + + n : int + The range is uniformly sampled at ``n`` number of points. + This keyword argument replaces ``nb_of_points``, which should be + considered deprecated. + + Aesthetics: + + line_color : string, or float, or function, optional + Specifies the color for the plot. + See ``Plot`` to see how to set color for the plots. + Note that by setting ``line_color``, it would be applied simultaneously + to all the series. + + label : str + The label to the plot. It will be used when called with ``legend=True`` + to denote the function with the given label in the plot. + + If there are multiple plots, then the same series arguments are applied to + all the plots. If you want to set these options separately, you can index + the returned ``Plot`` object and set it. + + Arguments for ``Plot`` class. + + title : str + Title of the plot. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of + the overall figure. The default value is set to ``None``, meaning + the size will be set by the default backend. + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import symbols, cos, sin + >>> from sympy.plotting import plot3d_parametric_line + >>> u = symbols('u') + + Single plot. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d_parametric_line(cos(u), sin(u), u, (u, -5, 5)) + Plot object containing: + [0]: 3D parametric cartesian line: (cos(u), sin(u), u) for u over (-5.0, 5.0) + + + Multiple plots. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d_parametric_line((cos(u), sin(u), u, (u, -5, 5)), + ... (sin(u), u**2, u, (u, -5, 5))) + Plot object containing: + [0]: 3D parametric cartesian line: (cos(u), sin(u), u) for u over (-5.0, 5.0) + [1]: 3D parametric cartesian line: (sin(u), u**2, u) for u over (-5.0, 5.0) + + + See Also + ======== + + Plot, Parametric3DLineSeries + + """ + args = _plot_sympify(args) + plot_expr = _check_arguments(args, 3, 1, **kwargs) + kwargs.setdefault("xlabel", "x") + kwargs.setdefault("ylabel", "y") + kwargs.setdefault("zlabel", "z") + + labels = kwargs.pop("label", []) + rendering_kw = kwargs.pop("rendering_kw", None) + series = _create_series(Parametric3DLineSeries, plot_expr, **kwargs) + _set_labels(series, labels, rendering_kw) + + plots = plot_factory(*series, **kwargs) + if show: + plots.show() + return plots + + +def _plot3d_plot_contour_helper(Series, *args, **kwargs): + """plot3d and plot_contour are structurally identical. Let's reduce + code repetition. + """ + # NOTE: if this import would be at the top-module level, it would trigger + # SymPy's optional-dependencies tests to fail. + from sympy.vector import BaseScalar + + args = _plot_sympify(args) + plot_expr = _check_arguments(args, 1, 2, **kwargs) + + free_x = set() + free_y = set() + _types = (Symbol, BaseScalar, Indexed, AppliedUndef) + for p in plot_expr: + free_x |= {p[1][0]} if isinstance(p[1][0], _types) else {Symbol(p[1][0])} + free_y |= {p[2][0]} if isinstance(p[2][0], _types) else {Symbol(p[2][0])} + x = free_x.pop() if free_x else Symbol("x") + y = free_y.pop() if free_y else Symbol("y") + kwargs.setdefault("xlabel", x) + kwargs.setdefault("ylabel", y) + kwargs.setdefault("zlabel", Function('f')(x, y)) + + # if a polar discretization is requested and automatic labelling has ben + # applied, hide the labels on the x-y axis. + if kwargs.get("is_polar", False): + if callable(kwargs["xlabel"]): + kwargs["xlabel"] = "" + if callable(kwargs["ylabel"]): + kwargs["ylabel"] = "" + + labels = kwargs.pop("label", []) + rendering_kw = kwargs.pop("rendering_kw", None) + series = _create_series(Series, plot_expr, **kwargs) + _set_labels(series, labels, rendering_kw) + plots = plot_factory(*series, **kwargs) + if kwargs.get("show", True): + plots.show() + return plots + + +def plot3d(*args, show=True, **kwargs): + """ + Plots a 3D surface plot. + + Usage + ===== + + Single plot + + ``plot3d(expr, range_x, range_y, **kwargs)`` + + If the ranges are not specified, then a default range of (-10, 10) is used. + + Multiple plot with the same range. + + ``plot3d(expr1, expr2, range_x, range_y, **kwargs)`` + + If the ranges are not specified, then a default range of (-10, 10) is used. + + Multiple plots with different ranges. + + ``plot3d((expr1, range_x, range_y), (expr2, range_x, range_y), ..., **kwargs)`` + + Ranges have to be specified for every expression. + + Default range may change in the future if a more advanced default range + detection algorithm is implemented. + + Arguments + ========= + + expr : Expression representing the function along x. + + range_x : (:class:`~.Symbol`, float, float) + A 3-tuple denoting the range of the x variable, e.g. (x, 0, 5). + + range_y : (:class:`~.Symbol`, float, float) + A 3-tuple denoting the range of the y variable, e.g. (y, 0, 5). + + Keyword Arguments + ================= + + Arguments for ``SurfaceOver2DRangeSeries`` class: + + n1 : int + The x range is sampled uniformly at ``n1`` of points. + This keyword argument replaces ``nb_of_points_x``, which should be + considered deprecated. + + n2 : int + The y range is sampled uniformly at ``n2`` of points. + This keyword argument replaces ``nb_of_points_y``, which should be + considered deprecated. + + Aesthetics: + + surface_color : Function which returns a float + Specifies the color for the surface of the plot. + See :class:`~.Plot` for more details. + + If there are multiple plots, then the same series arguments are applied to + all the plots. If you want to set these options separately, you can index + the returned ``Plot`` object and set it. + + Arguments for ``Plot`` class: + + title : str + Title of the plot. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of the + overall figure. The default value is set to ``None``, meaning the size will + be set by the default backend. + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import symbols + >>> from sympy.plotting import plot3d + >>> x, y = symbols('x y') + + Single plot + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d(x*y, (x, -5, 5), (y, -5, 5)) + Plot object containing: + [0]: cartesian surface: x*y for x over (-5.0, 5.0) and y over (-5.0, 5.0) + + + Multiple plots with same range + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d(x*y, -x*y, (x, -5, 5), (y, -5, 5)) + Plot object containing: + [0]: cartesian surface: x*y for x over (-5.0, 5.0) and y over (-5.0, 5.0) + [1]: cartesian surface: -x*y for x over (-5.0, 5.0) and y over (-5.0, 5.0) + + + Multiple plots with different ranges. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d((x**2 + y**2, (x, -5, 5), (y, -5, 5)), + ... (x*y, (x, -3, 3), (y, -3, 3))) + Plot object containing: + [0]: cartesian surface: x**2 + y**2 for x over (-5.0, 5.0) and y over (-5.0, 5.0) + [1]: cartesian surface: x*y for x over (-3.0, 3.0) and y over (-3.0, 3.0) + + + See Also + ======== + + Plot, SurfaceOver2DRangeSeries + + """ + kwargs.setdefault("show", show) + return _plot3d_plot_contour_helper( + SurfaceOver2DRangeSeries, *args, **kwargs) + + +def plot3d_parametric_surface(*args, show=True, **kwargs): + """ + Plots a 3D parametric surface plot. + + Explanation + =========== + + Single plot. + + ``plot3d_parametric_surface(expr_x, expr_y, expr_z, range_u, range_v, **kwargs)`` + + If the ranges is not specified, then a default range of (-10, 10) is used. + + Multiple plots. + + ``plot3d_parametric_surface((expr_x, expr_y, expr_z, range_u, range_v), ..., **kwargs)`` + + Ranges have to be specified for every expression. + + Default range may change in the future if a more advanced default range + detection algorithm is implemented. + + Arguments + ========= + + expr_x : Expression representing the function along ``x``. + + expr_y : Expression representing the function along ``y``. + + expr_z : Expression representing the function along ``z``. + + range_u : (:class:`~.Symbol`, float, float) + A 3-tuple denoting the range of the u variable, e.g. (u, 0, 5). + + range_v : (:class:`~.Symbol`, float, float) + A 3-tuple denoting the range of the v variable, e.g. (v, 0, 5). + + Keyword Arguments + ================= + + Arguments for ``ParametricSurfaceSeries`` class: + + n1 : int + The ``u`` range is sampled uniformly at ``n1`` of points. + This keyword argument replaces ``nb_of_points_u``, which should be + considered deprecated. + + n2 : int + The ``v`` range is sampled uniformly at ``n2`` of points. + This keyword argument replaces ``nb_of_points_v``, which should be + considered deprecated. + + Aesthetics: + + surface_color : Function which returns a float + Specifies the color for the surface of the plot. See + :class:`~Plot` for more details. + + If there are multiple plots, then the same series arguments are applied for + all the plots. If you want to set these options separately, you can index + the returned ``Plot`` object and set it. + + + Arguments for ``Plot`` class: + + title : str + Title of the plot. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of the + overall figure. The default value is set to ``None``, meaning the size will + be set by the default backend. + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import symbols, cos, sin + >>> from sympy.plotting import plot3d_parametric_surface + >>> u, v = symbols('u v') + + Single plot. + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> plot3d_parametric_surface(cos(u + v), sin(u - v), u - v, + ... (u, -5, 5), (v, -5, 5)) + Plot object containing: + [0]: parametric cartesian surface: (cos(u + v), sin(u - v), u - v) for u over (-5.0, 5.0) and v over (-5.0, 5.0) + + + See Also + ======== + + Plot, ParametricSurfaceSeries + + """ + + args = _plot_sympify(args) + plot_expr = _check_arguments(args, 3, 2, **kwargs) + kwargs.setdefault("xlabel", "x") + kwargs.setdefault("ylabel", "y") + kwargs.setdefault("zlabel", "z") + + labels = kwargs.pop("label", []) + rendering_kw = kwargs.pop("rendering_kw", None) + series = _create_series(ParametricSurfaceSeries, plot_expr, **kwargs) + _set_labels(series, labels, rendering_kw) + + plots = plot_factory(*series, **kwargs) + if show: + plots.show() + return plots + +def plot_contour(*args, show=True, **kwargs): + """ + Draws contour plot of a function + + Usage + ===== + + Single plot + + ``plot_contour(expr, range_x, range_y, **kwargs)`` + + If the ranges are not specified, then a default range of (-10, 10) is used. + + Multiple plot with the same range. + + ``plot_contour(expr1, expr2, range_x, range_y, **kwargs)`` + + If the ranges are not specified, then a default range of (-10, 10) is used. + + Multiple plots with different ranges. + + ``plot_contour((expr1, range_x, range_y), (expr2, range_x, range_y), ..., **kwargs)`` + + Ranges have to be specified for every expression. + + Default range may change in the future if a more advanced default range + detection algorithm is implemented. + + Arguments + ========= + + expr : Expression representing the function along x. + + range_x : (:class:`Symbol`, float, float) + A 3-tuple denoting the range of the x variable, e.g. (x, 0, 5). + + range_y : (:class:`Symbol`, float, float) + A 3-tuple denoting the range of the y variable, e.g. (y, 0, 5). + + Keyword Arguments + ================= + + Arguments for ``ContourSeries`` class: + + n1 : int + The x range is sampled uniformly at ``n1`` of points. + This keyword argument replaces ``nb_of_points_x``, which should be + considered deprecated. + + n2 : int + The y range is sampled uniformly at ``n2`` of points. + This keyword argument replaces ``nb_of_points_y``, which should be + considered deprecated. + + Aesthetics: + + surface_color : Function which returns a float + Specifies the color for the surface of the plot. See + :class:`sympy.plotting.Plot` for more details. + + If there are multiple plots, then the same series arguments are applied to + all the plots. If you want to set these options separately, you can index + the returned ``Plot`` object and set it. + + Arguments for ``Plot`` class: + + title : str + Title of the plot. + + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of + the overall figure. The default value is set to ``None``, meaning + the size will be set by the default backend. + + See Also + ======== + + Plot, ContourSeries + + """ + kwargs.setdefault("show", show) + return _plot3d_plot_contour_helper(ContourSeries, *args, **kwargs) + + +def check_arguments(args, expr_len, nb_of_free_symbols): + """ + Checks the arguments and converts into tuples of the + form (exprs, ranges). + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import cos, sin, symbols + >>> from sympy.plotting.plot import check_arguments + >>> x = symbols('x') + >>> check_arguments([cos(x), sin(x)], 2, 1) + [(cos(x), sin(x), (x, -10, 10))] + + >>> check_arguments([x, x**2], 1, 1) + [(x, (x, -10, 10)), (x**2, (x, -10, 10))] + """ + if not args: + return [] + if expr_len > 1 and isinstance(args[0], Expr): + # Multiple expressions same range. + # The arguments are tuples when the expression length is + # greater than 1. + if len(args) < expr_len: + raise ValueError("len(args) should not be less than expr_len") + for i in range(len(args)): + if isinstance(args[i], Tuple): + break + else: + i = len(args) + 1 + + exprs = Tuple(*args[:i]) + free_symbols = list(set().union(*[e.free_symbols for e in exprs])) + if len(args) == expr_len + nb_of_free_symbols: + #Ranges given + plots = [exprs + Tuple(*args[expr_len:])] + else: + default_range = Tuple(-10, 10) + ranges = [] + for symbol in free_symbols: + ranges.append(Tuple(symbol) + default_range) + + for i in range(len(free_symbols) - nb_of_free_symbols): + ranges.append(Tuple(Dummy()) + default_range) + plots = [exprs + Tuple(*ranges)] + return plots + + if isinstance(args[0], Expr) or (isinstance(args[0], Tuple) and + len(args[0]) == expr_len and + expr_len != 3): + # Cannot handle expressions with number of expression = 3. It is + # not possible to differentiate between expressions and ranges. + #Series of plots with same range + for i in range(len(args)): + if isinstance(args[i], Tuple) and len(args[i]) != expr_len: + break + if not isinstance(args[i], Tuple): + args[i] = Tuple(args[i]) + else: + i = len(args) + 1 + + exprs = args[:i] + assert all(isinstance(e, Expr) for expr in exprs for e in expr) + free_symbols = list(set().union(*[e.free_symbols for expr in exprs + for e in expr])) + + if len(free_symbols) > nb_of_free_symbols: + raise ValueError("The number of free_symbols in the expression " + "is greater than %d" % nb_of_free_symbols) + if len(args) == i + nb_of_free_symbols and isinstance(args[i], Tuple): + ranges = Tuple(*list(args[ + i:i + nb_of_free_symbols])) + plots = [expr + ranges for expr in exprs] + return plots + else: + # Use default ranges. + default_range = Tuple(-10, 10) + ranges = [] + for symbol in free_symbols: + ranges.append(Tuple(symbol) + default_range) + + for i in range(nb_of_free_symbols - len(free_symbols)): + ranges.append(Tuple(Dummy()) + default_range) + ranges = Tuple(*ranges) + plots = [expr + ranges for expr in exprs] + return plots + + elif isinstance(args[0], Tuple) and len(args[0]) == expr_len + nb_of_free_symbols: + # Multiple plots with different ranges. + for arg in args: + for i in range(expr_len): + if not isinstance(arg[i], Expr): + raise ValueError("Expected an expression, given %s" % + str(arg[i])) + for i in range(nb_of_free_symbols): + if not len(arg[i + expr_len]) == 3: + raise ValueError("The ranges should be a tuple of " + "length 3, got %s" % str(arg[i + expr_len])) + return args diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot_implicit.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot_implicit.py new file mode 100644 index 0000000000000000000000000000000000000000..5dceaf0699a2e6d3ff0bc30f415721918724cad5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plot_implicit.py @@ -0,0 +1,233 @@ +"""Implicit plotting module for SymPy. + +Explanation +=========== + +The module implements a data series called ImplicitSeries which is used by +``Plot`` class to plot implicit plots for different backends. The module, +by default, implements plotting using interval arithmetic. It switches to a +fall back algorithm if the expression cannot be plotted using interval arithmetic. +It is also possible to specify to use the fall back algorithm for all plots. + +Boolean combinations of expressions cannot be plotted by the fall back +algorithm. + +See Also +======== + +sympy.plotting.plot + +References +========== + +.. [1] Jeffrey Allen Tupper. Reliable Two-Dimensional Graphing Methods for +Mathematical Formulae with Two Free Variables. + +.. [2] Jeffrey Allen Tupper. Graphing Equations with Generalized Interval +Arithmetic. Master's thesis. University of Toronto, 1996 + +""" + + +from sympy.core.containers import Tuple +from sympy.core.symbol import (Dummy, Symbol) +from sympy.polys.polyutils import _sort_gens +from sympy.plotting.series import ImplicitSeries, _set_discretization_points +from sympy.plotting.plot import plot_factory +from sympy.utilities.decorator import doctest_depends_on +from sympy.utilities.iterables import flatten + + +__doctest_requires__ = {'plot_implicit': ['matplotlib']} + + +@doctest_depends_on(modules=('matplotlib',)) +def plot_implicit(expr, x_var=None, y_var=None, adaptive=True, depth=0, + n=300, line_color="blue", show=True, **kwargs): + """A plot function to plot implicit equations / inequalities. + + Arguments + ========= + + - expr : The equation / inequality that is to be plotted. + - x_var (optional) : symbol to plot on x-axis or tuple giving symbol + and range as ``(symbol, xmin, xmax)`` + - y_var (optional) : symbol to plot on y-axis or tuple giving symbol + and range as ``(symbol, ymin, ymax)`` + + If neither ``x_var`` nor ``y_var`` are given then the free symbols in the + expression will be assigned in the order they are sorted. + + The following keyword arguments can also be used: + + - ``adaptive`` Boolean. The default value is set to True. It has to be + set to False if you want to use a mesh grid. + + - ``depth`` integer. The depth of recursion for adaptive mesh grid. + Default value is 0. Takes value in the range (0, 4). + + - ``n`` integer. The number of points if adaptive mesh grid is not + used. Default value is 300. This keyword argument replaces ``points``, + which should be considered deprecated. + + - ``show`` Boolean. Default value is True. If set to False, the plot will + not be shown. See ``Plot`` for further information. + + - ``title`` string. The title for the plot. + + - ``xlabel`` string. The label for the x-axis + + - ``ylabel`` string. The label for the y-axis + + Aesthetics options: + + - ``line_color``: float or string. Specifies the color for the plot. + See ``Plot`` to see how to set color for the plots. + Default value is "Blue" + + plot_implicit, by default, uses interval arithmetic to plot functions. If + the expression cannot be plotted using interval arithmetic, it defaults to + a generating a contour using a mesh grid of fixed number of points. By + setting adaptive to False, you can force plot_implicit to use the mesh + grid. The mesh grid method can be effective when adaptive plotting using + interval arithmetic, fails to plot with small line width. + + Examples + ======== + + Plot expressions: + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import plot_implicit, symbols, Eq, And + >>> x, y = symbols('x y') + + Without any ranges for the symbols in the expression: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p1 = plot_implicit(Eq(x**2 + y**2, 5)) + + With the range for the symbols: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p2 = plot_implicit( + ... Eq(x**2 + y**2, 3), (x, -3, 3), (y, -3, 3)) + + With depth of recursion as argument: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p3 = plot_implicit( + ... Eq(x**2 + y**2, 5), (x, -4, 4), (y, -4, 4), depth = 2) + + Using mesh grid and not using adaptive meshing: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p4 = plot_implicit( + ... Eq(x**2 + y**2, 5), (x, -5, 5), (y, -2, 2), + ... adaptive=False) + + Using mesh grid without using adaptive meshing with number of points + specified: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p5 = plot_implicit( + ... Eq(x**2 + y**2, 5), (x, -5, 5), (y, -2, 2), + ... adaptive=False, n=400) + + Plotting regions: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p6 = plot_implicit(y > x**2) + + Plotting Using boolean conjunctions: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p7 = plot_implicit(And(y > x, y > -x)) + + When plotting an expression with a single variable (y - 1, for example), + specify the x or the y variable explicitly: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> p8 = plot_implicit(y - 1, y_var=y) + >>> p9 = plot_implicit(x - 1, x_var=x) + """ + + xyvar = [i for i in (x_var, y_var) if i is not None] + free_symbols = expr.free_symbols + range_symbols = Tuple(*flatten(xyvar)).free_symbols + undeclared = free_symbols - range_symbols + if len(free_symbols & range_symbols) > 2: + raise NotImplementedError("Implicit plotting is not implemented for " + "more than 2 variables") + + #Create default ranges if the range is not provided. + default_range = Tuple(-5, 5) + def _range_tuple(s): + if isinstance(s, Symbol): + return Tuple(s) + default_range + if len(s) == 3: + return Tuple(*s) + raise ValueError('symbol or `(symbol, min, max)` expected but got %s' % s) + + if len(xyvar) == 0: + xyvar = list(_sort_gens(free_symbols)) + var_start_end_x = _range_tuple(xyvar[0]) + x = var_start_end_x[0] + if len(xyvar) != 2: + if x in undeclared or not undeclared: + xyvar.append(Dummy('f(%s)' % x.name)) + else: + xyvar.append(undeclared.pop()) + var_start_end_y = _range_tuple(xyvar[1]) + + kwargs = _set_discretization_points(kwargs, ImplicitSeries) + series_argument = ImplicitSeries( + expr, var_start_end_x, var_start_end_y, + adaptive=adaptive, depth=depth, + n=n, line_color=line_color) + + #set the x and y limits + kwargs['xlim'] = tuple(float(x) for x in var_start_end_x[1:]) + kwargs['ylim'] = tuple(float(y) for y in var_start_end_y[1:]) + # set the x and y labels + kwargs.setdefault('xlabel', var_start_end_x[0]) + kwargs.setdefault('ylabel', var_start_end_y[0]) + p = plot_factory(series_argument, **kwargs) + if show: + p.show() + return p diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plotgrid.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plotgrid.py new file mode 100644 index 0000000000000000000000000000000000000000..8ff811c591e762275df1a0e3a221d05920d1804e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/plotgrid.py @@ -0,0 +1,188 @@ + +from sympy.external import import_module +import sympy.plotting.backends.base_backend as base_backend + + +# N.B. +# When changing the minimum module version for matplotlib, please change +# the same in the `SymPyDocTestFinder`` in `sympy/testing/runtests.py` + + +__doctest_requires__ = { + ("PlotGrid",): ["matplotlib"], +} + + +class PlotGrid: + """This class helps to plot subplots from already created SymPy plots + in a single figure. + + Examples + ======== + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> from sympy import symbols + >>> from sympy.plotting import plot, plot3d, PlotGrid + >>> x, y = symbols('x, y') + >>> p1 = plot(x, x**2, x**3, (x, -5, 5)) + >>> p2 = plot((x**2, (x, -6, 6)), (x, (x, -5, 5))) + >>> p3 = plot(x**3, (x, -5, 5)) + >>> p4 = plot3d(x*y, (x, -5, 5), (y, -5, 5)) + + Plotting vertically in a single line: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> PlotGrid(2, 1, p1, p2) + PlotGrid object containing: + Plot[0]:Plot object containing: + [0]: cartesian line: x for x over (-5.0, 5.0) + [1]: cartesian line: x**2 for x over (-5.0, 5.0) + [2]: cartesian line: x**3 for x over (-5.0, 5.0) + Plot[1]:Plot object containing: + [0]: cartesian line: x**2 for x over (-6.0, 6.0) + [1]: cartesian line: x for x over (-5.0, 5.0) + + Plotting horizontally in a single line: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> PlotGrid(1, 3, p2, p3, p4) + PlotGrid object containing: + Plot[0]:Plot object containing: + [0]: cartesian line: x**2 for x over (-6.0, 6.0) + [1]: cartesian line: x for x over (-5.0, 5.0) + Plot[1]:Plot object containing: + [0]: cartesian line: x**3 for x over (-5.0, 5.0) + Plot[2]:Plot object containing: + [0]: cartesian surface: x*y for x over (-5.0, 5.0) and y over (-5.0, 5.0) + + Plotting in a grid form: + + .. plot:: + :context: close-figs + :format: doctest + :include-source: True + + >>> PlotGrid(2, 2, p1, p2, p3, p4) + PlotGrid object containing: + Plot[0]:Plot object containing: + [0]: cartesian line: x for x over (-5.0, 5.0) + [1]: cartesian line: x**2 for x over (-5.0, 5.0) + [2]: cartesian line: x**3 for x over (-5.0, 5.0) + Plot[1]:Plot object containing: + [0]: cartesian line: x**2 for x over (-6.0, 6.0) + [1]: cartesian line: x for x over (-5.0, 5.0) + Plot[2]:Plot object containing: + [0]: cartesian line: x**3 for x over (-5.0, 5.0) + Plot[3]:Plot object containing: + [0]: cartesian surface: x*y for x over (-5.0, 5.0) and y over (-5.0, 5.0) + + """ + def __init__(self, nrows, ncolumns, *args, show=True, size=None, **kwargs): + """ + Parameters + ========== + + nrows : + The number of rows that should be in the grid of the + required subplot. + ncolumns : + The number of columns that should be in the grid + of the required subplot. + + nrows and ncolumns together define the required grid. + + Arguments + ========= + + A list of predefined plot objects entered in a row-wise sequence + i.e. plot objects which are to be in the top row of the required + grid are written first, then the second row objects and so on + + Keyword arguments + ================= + + show : Boolean + The default value is set to ``True``. Set show to ``False`` and + the function will not display the subplot. The returned instance + of the ``PlotGrid`` class can then be used to save or display the + plot by calling the ``save()`` and ``show()`` methods + respectively. + size : (float, float), optional + A tuple in the form (width, height) in inches to specify the size of + the overall figure. The default value is set to ``None``, meaning + the size will be set by the default backend. + """ + self.matplotlib = import_module('matplotlib', + import_kwargs={'fromlist': ['pyplot', 'cm', 'collections']}, + min_module_version='1.1.0', catch=(RuntimeError,)) + self.nrows = nrows + self.ncolumns = ncolumns + self._series = [] + self._fig = None + self.args = args + for arg in args: + self._series.append(arg._series) + self.size = size + if show and self.matplotlib: + self.show() + + def _create_figure(self): + gs = self.matplotlib.gridspec.GridSpec(self.nrows, self.ncolumns) + mapping = {} + c = 0 + for i in range(self.nrows): + for j in range(self.ncolumns): + if c < len(self.args): + mapping[gs[i, j]] = self.args[c] + c += 1 + + kw = {} if not self.size else {"figsize": self.size} + self._fig = self.matplotlib.pyplot.figure(**kw) + for spec, p in mapping.items(): + kw = ({"projection": "3d"} if (len(p._series) > 0 and + p._series[0].is_3D) else {}) + cur_ax = self._fig.add_subplot(spec, **kw) + p._plotgrid_fig = self._fig + p._plotgrid_ax = cur_ax + p.process_series() + + @property + def fig(self): + if not self._fig: + self._create_figure() + return self._fig + + @property + def _backend(self): + return self + + def close(self): + self.matplotlib.pyplot.close(self.fig) + + def show(self): + if base_backend._show: + self.fig.tight_layout() + self.matplotlib.pyplot.show() + else: + self.close() + + def save(self, path): + self.fig.savefig(path) + + def __str__(self): + plot_strs = [('Plot[%d]:' % i) + str(plot) + for i, plot in enumerate(self.args)] + + return 'PlotGrid object containing:\n' + '\n'.join(plot_strs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..cd86a505d8c4b8026bd91cde27d441e00223a8bc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__init__.py @@ -0,0 +1,138 @@ +"""Plotting module that can plot 2D and 3D functions +""" + +from sympy.utilities.decorator import doctest_depends_on + +@doctest_depends_on(modules=('pyglet',)) +def PygletPlot(*args, **kwargs): + """ + + Plot Examples + ============= + + See examples/advanced/pyglet_plotting.py for many more examples. + + >>> from sympy.plotting.pygletplot import PygletPlot as Plot + >>> from sympy.abc import x, y, z + + >>> Plot(x*y**3-y*x**3) + [0]: -x**3*y + x*y**3, 'mode=cartesian' + + >>> p = Plot() + >>> p[1] = x*y + >>> p[1].color = z, (0.4,0.4,0.9), (0.9,0.4,0.4) + + >>> p = Plot() + >>> p[1] = x**2+y**2 + >>> p[2] = -x**2-y**2 + + + Variable Intervals + ================== + + The basic format is [var, min, max, steps], but the + syntax is flexible and arguments left out are taken + from the defaults for the current coordinate mode: + + >>> Plot(x**2) # implies [x,-5,5,100] + [0]: x**2, 'mode=cartesian' + + >>> Plot(x**2, [], []) # [x,-1,1,40], [y,-1,1,40] + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2-y**2, [100], [100]) # [x,-1,1,100], [y,-1,1,100] + [0]: x**2 - y**2, 'mode=cartesian' + >>> Plot(x**2, [x,-13,13,100]) + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2, [-13,13]) # [x,-13,13,100] + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2, [x,-13,13]) # [x,-13,13,100] + [0]: x**2, 'mode=cartesian' + >>> Plot(1*x, [], [x], mode='cylindrical') + ... # [unbound_theta,0,2*Pi,40], [x,-1,1,20] + [0]: x, 'mode=cartesian' + + + Coordinate Modes + ================ + + Plot supports several curvilinear coordinate modes, and + they independent for each plotted function. You can specify + a coordinate mode explicitly with the 'mode' named argument, + but it can be automatically determined for Cartesian or + parametric plots, and therefore must only be specified for + polar, cylindrical, and spherical modes. + + Specifically, Plot(function arguments) and Plot[n] = + (function arguments) will interpret your arguments as a + Cartesian plot if you provide one function and a parametric + plot if you provide two or three functions. Similarly, the + arguments will be interpreted as a curve if one variable is + used, and a surface if two are used. + + Supported mode names by number of variables: + + 1: parametric, cartesian, polar + 2: parametric, cartesian, cylindrical = polar, spherical + + >>> Plot(1, mode='spherical') + + + Calculator-like Interface + ========================= + + >>> p = Plot(visible=False) + >>> f = x**2 + >>> p[1] = f + >>> p[2] = f.diff(x) + >>> p[3] = f.diff(x).diff(x) + >>> p + [1]: x**2, 'mode=cartesian' + [2]: 2*x, 'mode=cartesian' + [3]: 2, 'mode=cartesian' + >>> p.show() + >>> p.clear() + >>> p + + >>> p[1] = x**2+y**2 + >>> p[1].style = 'solid' + >>> p[2] = -x**2-y**2 + >>> p[2].style = 'wireframe' + >>> p[1].color = z, (0.4,0.4,0.9), (0.9,0.4,0.4) + >>> p[1].style = 'both' + >>> p[2].style = 'both' + >>> p.close() + + + Plot Window Keyboard Controls + ============================= + + Screen Rotation: + X,Y axis Arrow Keys, A,S,D,W, Numpad 4,6,8,2 + Z axis Q,E, Numpad 7,9 + + Model Rotation: + Z axis Z,C, Numpad 1,3 + + Zoom: R,F, PgUp,PgDn, Numpad +,- + + Reset Camera: X, Numpad 5 + + Camera Presets: + XY F1 + XZ F2 + YZ F3 + Perspective F4 + + Sensitivity Modifier: SHIFT + + Axes Toggle: + Visible F5 + Colors F6 + + Close Window: ESCAPE + + ============================= + """ + + from sympy.plotting.pygletplot.plot import PygletPlot + return PygletPlot(*args, **kwargs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..898ad73e35653dd4149430b5f60d65cca94646cc Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/color_scheme.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/color_scheme.py new file mode 100644 index 0000000000000000000000000000000000000000..613e777a7f45f54349c47d272aa6d1c157bcd117 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/color_scheme.py @@ -0,0 +1,336 @@ +from sympy.core.basic import Basic +from sympy.core.symbol import (Symbol, symbols) +from sympy.utilities.lambdify import lambdify +from .util import interpolate, rinterpolate, create_bounds, update_bounds +from sympy.utilities.iterables import sift + + +class ColorGradient: + colors = [0.4, 0.4, 0.4], [0.9, 0.9, 0.9] + intervals = 0.0, 1.0 + + def __init__(self, *args): + if len(args) == 2: + self.colors = list(args) + self.intervals = [0.0, 1.0] + elif len(args) > 0: + if len(args) % 2 != 0: + raise ValueError("len(args) should be even") + self.colors = [args[i] for i in range(1, len(args), 2)] + self.intervals = [args[i] for i in range(0, len(args), 2)] + assert len(self.colors) == len(self.intervals) + + def copy(self): + c = ColorGradient() + c.colors = [e[::] for e in self.colors] + c.intervals = self.intervals[::] + return c + + def _find_interval(self, v): + m = len(self.intervals) + i = 0 + while i < m - 1 and self.intervals[i] <= v: + i += 1 + return i + + def _interpolate_axis(self, axis, v): + i = self._find_interval(v) + v = rinterpolate(self.intervals[i - 1], self.intervals[i], v) + return interpolate(self.colors[i - 1][axis], self.colors[i][axis], v) + + def __call__(self, r, g, b): + c = self._interpolate_axis + return c(0, r), c(1, g), c(2, b) + +default_color_schemes = {} # defined at the bottom of this file + + +class ColorScheme: + + def __init__(self, *args, **kwargs): + self.args = args + self.f, self.gradient = None, ColorGradient() + + if len(args) == 1 and not isinstance(args[0], Basic) and callable(args[0]): + self.f = args[0] + elif len(args) == 1 and isinstance(args[0], str): + if args[0] in default_color_schemes: + cs = default_color_schemes[args[0]] + self.f, self.gradient = cs.f, cs.gradient.copy() + else: + self.f = lambdify('x,y,z,u,v', args[0]) + else: + self.f, self.gradient = self._interpret_args(args) + self._test_color_function() + if not isinstance(self.gradient, ColorGradient): + raise ValueError("Color gradient not properly initialized. " + "(Not a ColorGradient instance.)") + + def _interpret_args(self, args): + f, gradient = None, self.gradient + atoms, lists = self._sort_args(args) + s = self._pop_symbol_list(lists) + s = self._fill_in_vars(s) + + # prepare the error message for lambdification failure + f_str = ', '.join(str(fa) for fa in atoms) + s_str = (str(sa) for sa in s) + s_str = ', '.join(sa for sa in s_str if sa.find('unbound') < 0) + f_error = ValueError("Could not interpret arguments " + "%s as functions of %s." % (f_str, s_str)) + + # try to lambdify args + if len(atoms) == 1: + fv = atoms[0] + try: + f = lambdify(s, [fv, fv, fv]) + except TypeError: + raise f_error + + elif len(atoms) == 3: + fr, fg, fb = atoms + try: + f = lambdify(s, [fr, fg, fb]) + except TypeError: + raise f_error + + else: + raise ValueError("A ColorScheme must provide 1 or 3 " + "functions in x, y, z, u, and/or v.") + + # try to intrepret any given color information + if len(lists) == 0: + gargs = [] + + elif len(lists) == 1: + gargs = lists[0] + + elif len(lists) == 2: + try: + (r1, g1, b1), (r2, g2, b2) = lists + except TypeError: + raise ValueError("If two color arguments are given, " + "they must be given in the format " + "(r1, g1, b1), (r2, g2, b2).") + gargs = lists + + elif len(lists) == 3: + try: + (r1, r2), (g1, g2), (b1, b2) = lists + except Exception: + raise ValueError("If three color arguments are given, " + "they must be given in the format " + "(r1, r2), (g1, g2), (b1, b2). To create " + "a multi-step gradient, use the syntax " + "[0, colorStart, step1, color1, ..., 1, " + "colorEnd].") + gargs = [[r1, g1, b1], [r2, g2, b2]] + + else: + raise ValueError("Don't know what to do with collection " + "arguments %s." % (', '.join(str(l) for l in lists))) + + if gargs: + try: + gradient = ColorGradient(*gargs) + except Exception as ex: + raise ValueError(("Could not initialize a gradient " + "with arguments %s. Inner " + "exception: %s") % (gargs, str(ex))) + + return f, gradient + + def _pop_symbol_list(self, lists): + symbol_lists = [] + for l in lists: + mark = True + for s in l: + if s is not None and not isinstance(s, Symbol): + mark = False + break + if mark: + lists.remove(l) + symbol_lists.append(l) + if len(symbol_lists) == 1: + return symbol_lists[0] + elif len(symbol_lists) == 0: + return [] + else: + raise ValueError("Only one list of Symbols " + "can be given for a color scheme.") + + def _fill_in_vars(self, args): + defaults = symbols('x,y,z,u,v') + v_error = ValueError("Could not find what to plot.") + if len(args) == 0: + return defaults + if not isinstance(args, (tuple, list)): + raise v_error + if len(args) == 0: + return defaults + for s in args: + if s is not None and not isinstance(s, Symbol): + raise v_error + # when vars are given explicitly, any vars + # not given are marked 'unbound' as to not + # be accidentally used in an expression + vars = [Symbol('unbound%i' % (i)) for i in range(1, 6)] + # interpret as t + if len(args) == 1: + vars[3] = args[0] + # interpret as u,v + elif len(args) == 2: + if args[0] is not None: + vars[3] = args[0] + if args[1] is not None: + vars[4] = args[1] + # interpret as x,y,z + elif len(args) >= 3: + # allow some of x,y,z to be + # left unbound if not given + if args[0] is not None: + vars[0] = args[0] + if args[1] is not None: + vars[1] = args[1] + if args[2] is not None: + vars[2] = args[2] + # interpret the rest as t + if len(args) >= 4: + vars[3] = args[3] + # ...or u,v + if len(args) >= 5: + vars[4] = args[4] + return vars + + def _sort_args(self, args): + lists, atoms = sift(args, + lambda a: isinstance(a, (tuple, list)), binary=True) + return atoms, lists + + def _test_color_function(self): + if not callable(self.f): + raise ValueError("Color function is not callable.") + try: + result = self.f(0, 0, 0, 0, 0) + if len(result) != 3: + raise ValueError("length should be equal to 3") + except TypeError: + raise ValueError("Color function needs to accept x,y,z,u,v, " + "as arguments even if it doesn't use all of them.") + except AssertionError: + raise ValueError("Color function needs to return 3-tuple r,g,b.") + except Exception: + pass # color function probably not valid at 0,0,0,0,0 + + def __call__(self, x, y, z, u, v): + try: + return self.f(x, y, z, u, v) + except Exception: + return None + + def apply_to_curve(self, verts, u_set, set_len=None, inc_pos=None): + """ + Apply this color scheme to a + set of vertices over a single + independent variable u. + """ + bounds = create_bounds() + cverts = [] + if callable(set_len): + set_len(len(u_set)*2) + # calculate f() = r,g,b for each vert + # and find the min and max for r,g,b + for _u in range(len(u_set)): + if verts[_u] is None: + cverts.append(None) + else: + x, y, z = verts[_u] + u, v = u_set[_u], None + c = self(x, y, z, u, v) + if c is not None: + c = list(c) + update_bounds(bounds, c) + cverts.append(c) + if callable(inc_pos): + inc_pos() + # scale and apply gradient + for _u in range(len(u_set)): + if cverts[_u] is not None: + for _c in range(3): + # scale from [f_min, f_max] to [0,1] + cverts[_u][_c] = rinterpolate(bounds[_c][0], bounds[_c][1], + cverts[_u][_c]) + # apply gradient + cverts[_u] = self.gradient(*cverts[_u]) + if callable(inc_pos): + inc_pos() + return cverts + + def apply_to_surface(self, verts, u_set, v_set, set_len=None, inc_pos=None): + """ + Apply this color scheme to a + set of vertices over two + independent variables u and v. + """ + bounds = create_bounds() + cverts = [] + if callable(set_len): + set_len(len(u_set)*len(v_set)*2) + # calculate f() = r,g,b for each vert + # and find the min and max for r,g,b + for _u in range(len(u_set)): + column = [] + for _v in range(len(v_set)): + if verts[_u][_v] is None: + column.append(None) + else: + x, y, z = verts[_u][_v] + u, v = u_set[_u], v_set[_v] + c = self(x, y, z, u, v) + if c is not None: + c = list(c) + update_bounds(bounds, c) + column.append(c) + if callable(inc_pos): + inc_pos() + cverts.append(column) + # scale and apply gradient + for _u in range(len(u_set)): + for _v in range(len(v_set)): + if cverts[_u][_v] is not None: + # scale from [f_min, f_max] to [0,1] + for _c in range(3): + cverts[_u][_v][_c] = rinterpolate(bounds[_c][0], + bounds[_c][1], cverts[_u][_v][_c]) + # apply gradient + cverts[_u][_v] = self.gradient(*cverts[_u][_v]) + if callable(inc_pos): + inc_pos() + return cverts + + def str_base(self): + return ", ".join(str(a) for a in self.args) + + def __repr__(self): + return "%s" % (self.str_base()) + + +x, y, z, t, u, v = symbols('x,y,z,t,u,v') + +default_color_schemes['rainbow'] = ColorScheme(z, y, x) +default_color_schemes['zfade'] = ColorScheme(z, (0.4, 0.4, 0.97), + (0.97, 0.4, 0.4), (None, None, z)) +default_color_schemes['zfade3'] = ColorScheme(z, (None, None, z), + [0.00, (0.2, 0.2, 1.0), + 0.35, (0.2, 0.8, 0.4), + 0.50, (0.3, 0.9, 0.3), + 0.65, (0.4, 0.8, 0.2), + 1.00, (1.0, 0.2, 0.2)]) + +default_color_schemes['zfade4'] = ColorScheme(z, (None, None, z), + [0.0, (0.3, 0.3, 1.0), + 0.30, (0.3, 1.0, 0.3), + 0.55, (0.95, 1.0, 0.2), + 0.65, (1.0, 0.95, 0.2), + 0.85, (1.0, 0.7, 0.2), + 1.0, (1.0, 0.3, 0.2)]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/managed_window.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/managed_window.py new file mode 100644 index 0000000000000000000000000000000000000000..81fa2541b4dd9e13534aabfd2a11bf88c479daf8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/managed_window.py @@ -0,0 +1,106 @@ +from pyglet.window import Window +from pyglet.clock import Clock + +from threading import Thread, Lock + +gl_lock = Lock() + + +class ManagedWindow(Window): + """ + A pyglet window with an event loop which executes automatically + in a separate thread. Behavior is added by creating a subclass + which overrides setup, update, and/or draw. + """ + fps_limit = 30 + default_win_args = {"width": 600, + "height": 500, + "vsync": False, + "resizable": True} + + def __init__(self, **win_args): + """ + It is best not to override this function in the child + class, unless you need to take additional arguments. + Do any OpenGL initialization calls in setup(). + """ + + # check if this is run from the doctester + if win_args.get('runfromdoctester', False): + return + + self.win_args = dict(self.default_win_args, **win_args) + self.Thread = Thread(target=self.__event_loop__) + self.Thread.start() + + def __event_loop__(self, **win_args): + """ + The event loop thread function. Do not override or call + directly (it is called by __init__). + """ + gl_lock.acquire() + try: + try: + super().__init__(**self.win_args) + self.switch_to() + self.setup() + except Exception as e: + print("Window initialization failed: %s" % (str(e))) + self.has_exit = True + finally: + gl_lock.release() + + clock = Clock() + clock.fps_limit = self.fps_limit + while not self.has_exit: + dt = clock.tick() + gl_lock.acquire() + try: + try: + self.switch_to() + self.dispatch_events() + self.clear() + self.update(dt) + self.draw() + self.flip() + except Exception as e: + print("Uncaught exception in event loop: %s" % str(e)) + self.has_exit = True + finally: + gl_lock.release() + super().close() + + def close(self): + """ + Closes the window. + """ + self.has_exit = True + + def setup(self): + """ + Called once before the event loop begins. + Override this method in a child class. This + is the best place to put things like OpenGL + initialization calls. + """ + pass + + def update(self, dt): + """ + Called before draw during each iteration of + the event loop. dt is the elapsed time in + seconds since the last update. OpenGL rendering + calls are best put in draw() rather than here. + """ + pass + + def draw(self): + """ + Called after update during each iteration of + the event loop. Put OpenGL rendering calls + here. + """ + pass + +if __name__ == '__main__': + ManagedWindow() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot.py new file mode 100644 index 0000000000000000000000000000000000000000..8c3dd3c8d4ce6c660cc07f93a55029eef98e55a2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot.py @@ -0,0 +1,464 @@ +from threading import RLock + +# it is sufficient to import "pyglet" here once +try: + import pyglet.gl as pgl +except ImportError: + raise ImportError("pyglet is required for plotting.\n " + "visit https://pyglet.org/") + +from sympy.core.numbers import Integer +from sympy.external.gmpy import SYMPY_INTS +from sympy.geometry.entity import GeometryEntity +from sympy.plotting.pygletplot.plot_axes import PlotAxes +from sympy.plotting.pygletplot.plot_mode import PlotMode +from sympy.plotting.pygletplot.plot_object import PlotObject +from sympy.plotting.pygletplot.plot_window import PlotWindow +from sympy.plotting.pygletplot.util import parse_option_string +from sympy.utilities.decorator import doctest_depends_on +from sympy.utilities.iterables import is_sequence + +from time import sleep +from os import getcwd, listdir + +import ctypes + +@doctest_depends_on(modules=('pyglet',)) +class PygletPlot: + """ + Plot Examples + ============= + + See examples/advanced/pyglet_plotting.py for many more examples. + + >>> from sympy.plotting.pygletplot import PygletPlot as Plot + >>> from sympy.abc import x, y, z + + >>> Plot(x*y**3-y*x**3) + [0]: -x**3*y + x*y**3, 'mode=cartesian' + + >>> p = Plot() + >>> p[1] = x*y + >>> p[1].color = z, (0.4,0.4,0.9), (0.9,0.4,0.4) + + >>> p = Plot() + >>> p[1] = x**2+y**2 + >>> p[2] = -x**2-y**2 + + + Variable Intervals + ================== + + The basic format is [var, min, max, steps], but the + syntax is flexible and arguments left out are taken + from the defaults for the current coordinate mode: + + >>> Plot(x**2) # implies [x,-5,5,100] + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2, [], []) # [x,-1,1,40], [y,-1,1,40] + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2-y**2, [100], [100]) # [x,-1,1,100], [y,-1,1,100] + [0]: x**2 - y**2, 'mode=cartesian' + >>> Plot(x**2, [x,-13,13,100]) + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2, [-13,13]) # [x,-13,13,100] + [0]: x**2, 'mode=cartesian' + >>> Plot(x**2, [x,-13,13]) # [x,-13,13,10] + [0]: x**2, 'mode=cartesian' + >>> Plot(1*x, [], [x], mode='cylindrical') + ... # [unbound_theta,0,2*Pi,40], [x,-1,1,20] + [0]: x, 'mode=cartesian' + + + Coordinate Modes + ================ + + Plot supports several curvilinear coordinate modes, and + they independent for each plotted function. You can specify + a coordinate mode explicitly with the 'mode' named argument, + but it can be automatically determined for Cartesian or + parametric plots, and therefore must only be specified for + polar, cylindrical, and spherical modes. + + Specifically, Plot(function arguments) and Plot[n] = + (function arguments) will interpret your arguments as a + Cartesian plot if you provide one function and a parametric + plot if you provide two or three functions. Similarly, the + arguments will be interpreted as a curve if one variable is + used, and a surface if two are used. + + Supported mode names by number of variables: + + 1: parametric, cartesian, polar + 2: parametric, cartesian, cylindrical = polar, spherical + + >>> Plot(1, mode='spherical') + + + Calculator-like Interface + ========================= + + >>> p = Plot(visible=False) + >>> f = x**2 + >>> p[1] = f + >>> p[2] = f.diff(x) + >>> p[3] = f.diff(x).diff(x) + >>> p + [1]: x**2, 'mode=cartesian' + [2]: 2*x, 'mode=cartesian' + [3]: 2, 'mode=cartesian' + >>> p.show() + >>> p.clear() + >>> p + + >>> p[1] = x**2+y**2 + >>> p[1].style = 'solid' + >>> p[2] = -x**2-y**2 + >>> p[2].style = 'wireframe' + >>> p[1].color = z, (0.4,0.4,0.9), (0.9,0.4,0.4) + >>> p[1].style = 'both' + >>> p[2].style = 'both' + >>> p.close() + + + Plot Window Keyboard Controls + ============================= + + Screen Rotation: + X,Y axis Arrow Keys, A,S,D,W, Numpad 4,6,8,2 + Z axis Q,E, Numpad 7,9 + + Model Rotation: + Z axis Z,C, Numpad 1,3 + + Zoom: R,F, PgUp,PgDn, Numpad +,- + + Reset Camera: X, Numpad 5 + + Camera Presets: + XY F1 + XZ F2 + YZ F3 + Perspective F4 + + Sensitivity Modifier: SHIFT + + Axes Toggle: + Visible F5 + Colors F6 + + Close Window: ESCAPE + + ============================= + + """ + + @doctest_depends_on(modules=('pyglet',)) + def __init__(self, *fargs, **win_args): + """ + Positional Arguments + ==================== + + Any given positional arguments are used to + initialize a plot function at index 1. In + other words... + + >>> from sympy.plotting.pygletplot import PygletPlot as Plot + >>> from sympy.abc import x + >>> p = Plot(x**2, visible=False) + + ...is equivalent to... + + >>> p = Plot(visible=False) + >>> p[1] = x**2 + + Note that in earlier versions of the plotting + module, you were able to specify multiple + functions in the initializer. This functionality + has been dropped in favor of better automatic + plot plot_mode detection. + + + Named Arguments + =============== + + axes + An option string of the form + "key1=value1; key2 = value2" which + can use the following options: + + style = ordinate + none OR frame OR box OR ordinate + + stride = 0.25 + val OR (val_x, val_y, val_z) + + overlay = True (draw on top of plot) + True OR False + + colored = False (False uses Black, + True uses colors + R,G,B = X,Y,Z) + True OR False + + label_axes = False (display axis names + at endpoints) + True OR False + + visible = True (show immediately + True OR False + + + The following named arguments are passed as + arguments to window initialization: + + antialiasing = True + True OR False + + ortho = False + True OR False + + invert_mouse_zoom = False + True OR False + + """ + # Register the plot modes + from . import plot_modes # noqa + + self._win_args = win_args + self._window = None + + self._render_lock = RLock() + + self._functions = {} + self._pobjects = [] + self._screenshot = ScreenShot(self) + + axe_options = parse_option_string(win_args.pop('axes', '')) + self.axes = PlotAxes(**axe_options) + self._pobjects.append(self.axes) + + self[0] = fargs + if win_args.get('visible', True): + self.show() + + ## Window Interfaces + + def show(self): + """ + Creates and displays a plot window, or activates it + (gives it focus) if it has already been created. + """ + if self._window and not self._window.has_exit: + self._window.activate() + else: + self._win_args['visible'] = True + self.axes.reset_resources() + + #if hasattr(self, '_doctest_depends_on'): + # self._win_args['runfromdoctester'] = True + + self._window = PlotWindow(self, **self._win_args) + + def close(self): + """ + Closes the plot window. + """ + if self._window: + self._window.close() + + def saveimage(self, outfile=None, format='', size=(600, 500)): + """ + Saves a screen capture of the plot window to an + image file. + + If outfile is given, it can either be a path + or a file object. Otherwise a png image will + be saved to the current working directory. + If the format is omitted, it is determined from + the filename extension. + """ + self._screenshot.save(outfile, format, size) + + ## Function List Interfaces + + def clear(self): + """ + Clears the function list of this plot. + """ + self._render_lock.acquire() + self._functions = {} + self.adjust_all_bounds() + self._render_lock.release() + + def __getitem__(self, i): + """ + Returns the function at position i in the + function list. + """ + return self._functions[i] + + def __setitem__(self, i, args): + """ + Parses and adds a PlotMode to the function + list. + """ + if not (isinstance(i, (SYMPY_INTS, Integer)) and i >= 0): + raise ValueError("Function index must " + "be an integer >= 0.") + + if isinstance(args, PlotObject): + f = args + else: + if (not is_sequence(args)) or isinstance(args, GeometryEntity): + args = [args] + if len(args) == 0: + return # no arguments given + kwargs = {"bounds_callback": self.adjust_all_bounds} + f = PlotMode(*args, **kwargs) + + if f: + self._render_lock.acquire() + self._functions[i] = f + self._render_lock.release() + else: + raise ValueError("Failed to parse '%s'." + % ', '.join(str(a) for a in args)) + + def __delitem__(self, i): + """ + Removes the function in the function list at + position i. + """ + self._render_lock.acquire() + del self._functions[i] + self.adjust_all_bounds() + self._render_lock.release() + + def firstavailableindex(self): + """ + Returns the first unused index in the function list. + """ + i = 0 + self._render_lock.acquire() + while i in self._functions: + i += 1 + self._render_lock.release() + return i + + def append(self, *args): + """ + Parses and adds a PlotMode to the function + list at the first available index. + """ + self.__setitem__(self.firstavailableindex(), args) + + def __len__(self): + """ + Returns the number of functions in the function list. + """ + return len(self._functions) + + def __iter__(self): + """ + Allows iteration of the function list. + """ + return self._functions.itervalues() + + def __repr__(self): + return str(self) + + def __str__(self): + """ + Returns a string containing a new-line separated + list of the functions in the function list. + """ + s = "" + if len(self._functions) == 0: + s += "" + else: + self._render_lock.acquire() + s += "\n".join(["%s[%i]: %s" % ("", i, str(self._functions[i])) + for i in self._functions]) + self._render_lock.release() + return s + + def adjust_all_bounds(self): + self._render_lock.acquire() + self.axes.reset_bounding_box() + for f in self._functions: + self.axes.adjust_bounds(self._functions[f].bounds) + self._render_lock.release() + + def wait_for_calculations(self): + sleep(0) + self._render_lock.acquire() + for f in self._functions: + a = self._functions[f]._get_calculating_verts + b = self._functions[f]._get_calculating_cverts + while a() or b(): + sleep(0) + self._render_lock.release() + +class ScreenShot: + def __init__(self, plot): + self._plot = plot + self.screenshot_requested = False + self.outfile = None + self.format = '' + self.invisibleMode = False + self.flag = 0 + + def __bool__(self): + return self.screenshot_requested + + def _execute_saving(self): + if self.flag < 3: + self.flag += 1 + return + + size_x, size_y = self._plot._window.get_size() + size = size_x*size_y*4*ctypes.sizeof(ctypes.c_ubyte) + image = ctypes.create_string_buffer(size) + pgl.glReadPixels(0, 0, size_x, size_y, pgl.GL_RGBA, pgl.GL_UNSIGNED_BYTE, image) + from PIL import Image + im = Image.frombuffer('RGBA', (size_x, size_y), + image.raw, 'raw', 'RGBA', 0, 1) + im.transpose(Image.FLIP_TOP_BOTTOM).save(self.outfile, self.format) + + self.flag = 0 + self.screenshot_requested = False + if self.invisibleMode: + self._plot._window.close() + + def save(self, outfile=None, format='', size=(600, 500)): + self.outfile = outfile + self.format = format + self.size = size + self.screenshot_requested = True + + if not self._plot._window or self._plot._window.has_exit: + self._plot._win_args['visible'] = False + + self._plot._win_args['width'] = size[0] + self._plot._win_args['height'] = size[1] + + self._plot.axes.reset_resources() + self._plot._window = PlotWindow(self._plot, **self._plot._win_args) + self.invisibleMode = True + + if self.outfile is None: + self.outfile = self._create_unique_path() + print(self.outfile) + + def _create_unique_path(self): + cwd = getcwd() + l = listdir(cwd) + path = '' + i = 0 + while True: + if not 'plot_%s.png' % i in l: + path = cwd + '/plot_%s.png' % i + break + i += 1 + return path diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_axes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_axes.py new file mode 100644 index 0000000000000000000000000000000000000000..ae26fb0b2fa64e7f7318c51ce3fe5afaa276b48e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_axes.py @@ -0,0 +1,251 @@ +import pyglet.gl as pgl +from pyglet import font + +from sympy.core import S +from sympy.plotting.pygletplot.plot_object import PlotObject +from sympy.plotting.pygletplot.util import billboard_matrix, dot_product, \ + get_direction_vectors, strided_range, vec_mag, vec_sub +from sympy.utilities.iterables import is_sequence + + +class PlotAxes(PlotObject): + + def __init__(self, *args, + style='', none=None, frame=None, box=None, ordinate=None, + stride=0.25, + visible='', overlay='', colored='', label_axes='', label_ticks='', + tick_length=0.1, + font_face='Arial', font_size=28, + **kwargs): + # initialize style parameter + style = style.lower() + + # allow alias kwargs to override style kwarg + if none is not None: + style = 'none' + if frame is not None: + style = 'frame' + if box is not None: + style = 'box' + if ordinate is not None: + style = 'ordinate' + + if style in ['', 'ordinate']: + self._render_object = PlotAxesOrdinate(self) + elif style in ['frame', 'box']: + self._render_object = PlotAxesFrame(self) + elif style in ['none']: + self._render_object = None + else: + raise ValueError(("Unrecognized axes style %s.") % (style)) + + # initialize stride parameter + try: + stride = eval(stride) + except TypeError: + pass + if is_sequence(stride): + if len(stride) != 3: + raise ValueError("length should be equal to 3") + self._stride = stride + else: + self._stride = [stride, stride, stride] + self._tick_length = float(tick_length) + + # setup bounding box and ticks + self._origin = [0, 0, 0] + self.reset_bounding_box() + + def flexible_boolean(input, default): + if input in [True, False]: + return input + if input in ('f', 'F', 'false', 'False'): + return False + if input in ('t', 'T', 'true', 'True'): + return True + return default + + # initialize remaining parameters + self.visible = flexible_boolean(kwargs, True) + self._overlay = flexible_boolean(overlay, True) + self._colored = flexible_boolean(colored, False) + self._label_axes = flexible_boolean(label_axes, False) + self._label_ticks = flexible_boolean(label_ticks, True) + + # setup label font + self.font_face = font_face + self.font_size = font_size + + # this is also used to reinit the + # font on window close/reopen + self.reset_resources() + + def reset_resources(self): + self.label_font = None + + def reset_bounding_box(self): + self._bounding_box = [[None, None], [None, None], [None, None]] + self._axis_ticks = [[], [], []] + + def draw(self): + if self._render_object: + pgl.glPushAttrib(pgl.GL_ENABLE_BIT | pgl.GL_POLYGON_BIT | pgl.GL_DEPTH_BUFFER_BIT) + if self._overlay: + pgl.glDisable(pgl.GL_DEPTH_TEST) + self._render_object.draw() + pgl.glPopAttrib() + + def adjust_bounds(self, child_bounds): + b = self._bounding_box + c = child_bounds + for i in range(3): + if abs(c[i][0]) is S.Infinity or abs(c[i][1]) is S.Infinity: + continue + b[i][0] = c[i][0] if b[i][0] is None else min([b[i][0], c[i][0]]) + b[i][1] = c[i][1] if b[i][1] is None else max([b[i][1], c[i][1]]) + self._bounding_box = b + self._recalculate_axis_ticks(i) + + def _recalculate_axis_ticks(self, axis): + b = self._bounding_box + if b[axis][0] is None or b[axis][1] is None: + self._axis_ticks[axis] = [] + else: + self._axis_ticks[axis] = strided_range(b[axis][0], b[axis][1], + self._stride[axis]) + + def toggle_visible(self): + self.visible = not self.visible + + def toggle_colors(self): + self._colored = not self._colored + + +class PlotAxesBase(PlotObject): + + def __init__(self, parent_axes): + self._p = parent_axes + + def draw(self): + color = [([0.2, 0.1, 0.3], [0.2, 0.1, 0.3], [0.2, 0.1, 0.3]), + ([0.9, 0.3, 0.5], [0.5, 1.0, 0.5], [0.3, 0.3, 0.9])][self._p._colored] + self.draw_background(color) + self.draw_axis(2, color[2]) + self.draw_axis(1, color[1]) + self.draw_axis(0, color[0]) + + def draw_background(self, color): + pass # optional + + def draw_axis(self, axis, color): + raise NotImplementedError() + + def draw_text(self, text, position, color, scale=1.0): + if len(color) == 3: + color = (color[0], color[1], color[2], 1.0) + + if self._p.label_font is None: + self._p.label_font = font.load(self._p.font_face, + self._p.font_size, + bold=True, italic=False) + + label = font.Text(self._p.label_font, text, + color=color, + valign=font.Text.BASELINE, + halign=font.Text.CENTER) + + pgl.glPushMatrix() + pgl.glTranslatef(*position) + billboard_matrix() + scale_factor = 0.005 * scale + pgl.glScalef(scale_factor, scale_factor, scale_factor) + pgl.glColor4f(0, 0, 0, 0) + label.draw() + pgl.glPopMatrix() + + def draw_line(self, v, color): + o = self._p._origin + pgl.glBegin(pgl.GL_LINES) + pgl.glColor3f(*color) + pgl.glVertex3f(v[0][0] + o[0], v[0][1] + o[1], v[0][2] + o[2]) + pgl.glVertex3f(v[1][0] + o[0], v[1][1] + o[1], v[1][2] + o[2]) + pgl.glEnd() + + +class PlotAxesOrdinate(PlotAxesBase): + + def __init__(self, parent_axes): + super().__init__(parent_axes) + + def draw_axis(self, axis, color): + ticks = self._p._axis_ticks[axis] + radius = self._p._tick_length / 2.0 + if len(ticks) < 2: + return + + # calculate the vector for this axis + axis_lines = [[0, 0, 0], [0, 0, 0]] + axis_lines[0][axis], axis_lines[1][axis] = ticks[0], ticks[-1] + axis_vector = vec_sub(axis_lines[1], axis_lines[0]) + + # calculate angle to the z direction vector + pos_z = get_direction_vectors()[2] + d = abs(dot_product(axis_vector, pos_z)) + d = d / vec_mag(axis_vector) + + # don't draw labels if we're looking down the axis + labels_visible = abs(d - 1.0) > 0.02 + + # draw the ticks and labels + for tick in ticks: + self.draw_tick_line(axis, color, radius, tick, labels_visible) + + # draw the axis line and labels + self.draw_axis_line(axis, color, ticks[0], ticks[-1], labels_visible) + + def draw_axis_line(self, axis, color, a_min, a_max, labels_visible): + axis_line = [[0, 0, 0], [0, 0, 0]] + axis_line[0][axis], axis_line[1][axis] = a_min, a_max + self.draw_line(axis_line, color) + if labels_visible: + self.draw_axis_line_labels(axis, color, axis_line) + + def draw_axis_line_labels(self, axis, color, axis_line): + if not self._p._label_axes: + return + axis_labels = [axis_line[0][::], axis_line[1][::]] + axis_labels[0][axis] -= 0.3 + axis_labels[1][axis] += 0.3 + a_str = ['X', 'Y', 'Z'][axis] + self.draw_text("-" + a_str, axis_labels[0], color) + self.draw_text("+" + a_str, axis_labels[1], color) + + def draw_tick_line(self, axis, color, radius, tick, labels_visible): + tick_axis = {0: 1, 1: 0, 2: 1}[axis] + tick_line = [[0, 0, 0], [0, 0, 0]] + tick_line[0][axis] = tick_line[1][axis] = tick + tick_line[0][tick_axis], tick_line[1][tick_axis] = -radius, radius + self.draw_line(tick_line, color) + if labels_visible: + self.draw_tick_line_label(axis, color, radius, tick) + + def draw_tick_line_label(self, axis, color, radius, tick): + if not self._p._label_axes: + return + tick_label_vector = [0, 0, 0] + tick_label_vector[axis] = tick + tick_label_vector[{0: 1, 1: 0, 2: 1}[axis]] = [-1, 1, 1][ + axis] * radius * 3.5 + self.draw_text(str(tick), tick_label_vector, color, scale=0.5) + + +class PlotAxesFrame(PlotAxesBase): + + def __init__(self, parent_axes): + super().__init__(parent_axes) + + def draw_background(self, color): + pass + + def draw_axis(self, axis, color): + raise NotImplementedError() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_camera.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_camera.py new file mode 100644 index 0000000000000000000000000000000000000000..43598debac252ffd22beb8690fef30745259c634 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_camera.py @@ -0,0 +1,124 @@ +import pyglet.gl as pgl +from sympy.plotting.pygletplot.plot_rotation import get_spherical_rotatation +from sympy.plotting.pygletplot.util import get_model_matrix, model_to_screen, \ + screen_to_model, vec_subs + + +class PlotCamera: + + min_dist = 0.05 + max_dist = 500.0 + + min_ortho_dist = 100.0 + max_ortho_dist = 10000.0 + + _default_dist = 6.0 + _default_ortho_dist = 600.0 + + rot_presets = { + 'xy': (0, 0, 0), + 'xz': (-90, 0, 0), + 'yz': (0, 90, 0), + 'perspective': (-45, 0, -45) + } + + def __init__(self, window, ortho=False): + self.window = window + self.axes = self.window.plot.axes + self.ortho = ortho + self.reset() + + def init_rot_matrix(self): + pgl.glPushMatrix() + pgl.glLoadIdentity() + self._rot = get_model_matrix() + pgl.glPopMatrix() + + def set_rot_preset(self, preset_name): + self.init_rot_matrix() + if preset_name not in self.rot_presets: + raise ValueError( + "%s is not a valid rotation preset." % preset_name) + r = self.rot_presets[preset_name] + self.euler_rotate(r[0], 1, 0, 0) + self.euler_rotate(r[1], 0, 1, 0) + self.euler_rotate(r[2], 0, 0, 1) + + def reset(self): + self._dist = 0.0 + self._x, self._y = 0.0, 0.0 + self._rot = None + if self.ortho: + self._dist = self._default_ortho_dist + else: + self._dist = self._default_dist + self.init_rot_matrix() + + def mult_rot_matrix(self, rot): + pgl.glPushMatrix() + pgl.glLoadMatrixf(rot) + pgl.glMultMatrixf(self._rot) + self._rot = get_model_matrix() + pgl.glPopMatrix() + + def setup_projection(self): + pgl.glMatrixMode(pgl.GL_PROJECTION) + pgl.glLoadIdentity() + if self.ortho: + # yep, this is pseudo ortho (don't tell anyone) + pgl.gluPerspective( + 0.3, float(self.window.width)/float(self.window.height), + self.min_ortho_dist - 0.01, self.max_ortho_dist + 0.01) + else: + pgl.gluPerspective( + 30.0, float(self.window.width)/float(self.window.height), + self.min_dist - 0.01, self.max_dist + 0.01) + pgl.glMatrixMode(pgl.GL_MODELVIEW) + + def _get_scale(self): + return 1.0, 1.0, 1.0 + + def apply_transformation(self): + pgl.glLoadIdentity() + pgl.glTranslatef(self._x, self._y, -self._dist) + if self._rot is not None: + pgl.glMultMatrixf(self._rot) + pgl.glScalef(*self._get_scale()) + + def spherical_rotate(self, p1, p2, sensitivity=1.0): + mat = get_spherical_rotatation(p1, p2, self.window.width, + self.window.height, sensitivity) + if mat is not None: + self.mult_rot_matrix(mat) + + def euler_rotate(self, angle, x, y, z): + pgl.glPushMatrix() + pgl.glLoadMatrixf(self._rot) + pgl.glRotatef(angle, x, y, z) + self._rot = get_model_matrix() + pgl.glPopMatrix() + + def zoom_relative(self, clicks, sensitivity): + + if self.ortho: + dist_d = clicks * sensitivity * 50.0 + min_dist = self.min_ortho_dist + max_dist = self.max_ortho_dist + else: + dist_d = clicks * sensitivity + min_dist = self.min_dist + max_dist = self.max_dist + + new_dist = (self._dist - dist_d) + if (clicks < 0 and new_dist < max_dist) or new_dist > min_dist: + self._dist = new_dist + + def mouse_translate(self, x, y, dx, dy): + pgl.glPushMatrix() + pgl.glLoadIdentity() + pgl.glTranslatef(0, 0, -self._dist) + z = model_to_screen(0, 0, 0)[2] + d = vec_subs(screen_to_model(x, y, z), screen_to_model(x - dx, y - dy, z)) + pgl.glPopMatrix() + self._x += d[0] + self._y += d[1] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_controller.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_controller.py new file mode 100644 index 0000000000000000000000000000000000000000..aa7e01e6fd17fddf07b733442208a0a4c9d87d5b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_controller.py @@ -0,0 +1,218 @@ +from pyglet.window import key +from pyglet.window.mouse import LEFT, RIGHT, MIDDLE +from sympy.plotting.pygletplot.util import get_direction_vectors, get_basis_vectors + + +class PlotController: + + normal_mouse_sensitivity = 4.0 + modified_mouse_sensitivity = 1.0 + + normal_key_sensitivity = 160.0 + modified_key_sensitivity = 40.0 + + keymap = { + key.LEFT: 'left', + key.A: 'left', + key.NUM_4: 'left', + + key.RIGHT: 'right', + key.D: 'right', + key.NUM_6: 'right', + + key.UP: 'up', + key.W: 'up', + key.NUM_8: 'up', + + key.DOWN: 'down', + key.S: 'down', + key.NUM_2: 'down', + + key.Z: 'rotate_z_neg', + key.NUM_1: 'rotate_z_neg', + + key.C: 'rotate_z_pos', + key.NUM_3: 'rotate_z_pos', + + key.Q: 'spin_left', + key.NUM_7: 'spin_left', + key.E: 'spin_right', + key.NUM_9: 'spin_right', + + key.X: 'reset_camera', + key.NUM_5: 'reset_camera', + + key.NUM_ADD: 'zoom_in', + key.PAGEUP: 'zoom_in', + key.R: 'zoom_in', + + key.NUM_SUBTRACT: 'zoom_out', + key.PAGEDOWN: 'zoom_out', + key.F: 'zoom_out', + + key.RSHIFT: 'modify_sensitivity', + key.LSHIFT: 'modify_sensitivity', + + key.F1: 'rot_preset_xy', + key.F2: 'rot_preset_xz', + key.F3: 'rot_preset_yz', + key.F4: 'rot_preset_perspective', + + key.F5: 'toggle_axes', + key.F6: 'toggle_axe_colors', + + key.F8: 'save_image' + } + + def __init__(self, window, *, invert_mouse_zoom=False, **kwargs): + self.invert_mouse_zoom = invert_mouse_zoom + self.window = window + self.camera = window.camera + self.action = { + # Rotation around the view Y (up) vector + 'left': False, + 'right': False, + # Rotation around the view X vector + 'up': False, + 'down': False, + # Rotation around the view Z vector + 'spin_left': False, + 'spin_right': False, + # Rotation around the model Z vector + 'rotate_z_neg': False, + 'rotate_z_pos': False, + # Reset to the default rotation + 'reset_camera': False, + # Performs camera z-translation + 'zoom_in': False, + 'zoom_out': False, + # Use alternative sensitivity (speed) + 'modify_sensitivity': False, + # Rotation presets + 'rot_preset_xy': False, + 'rot_preset_xz': False, + 'rot_preset_yz': False, + 'rot_preset_perspective': False, + # axes + 'toggle_axes': False, + 'toggle_axe_colors': False, + # screenshot + 'save_image': False + } + + def update(self, dt): + z = 0 + if self.action['zoom_out']: + z -= 1 + if self.action['zoom_in']: + z += 1 + if z != 0: + self.camera.zoom_relative(z/10.0, self.get_key_sensitivity()/10.0) + + dx, dy, dz = 0, 0, 0 + if self.action['left']: + dx -= 1 + if self.action['right']: + dx += 1 + if self.action['up']: + dy -= 1 + if self.action['down']: + dy += 1 + if self.action['spin_left']: + dz += 1 + if self.action['spin_right']: + dz -= 1 + + if not self.is_2D(): + if dx != 0: + self.camera.euler_rotate(dx*dt*self.get_key_sensitivity(), + *(get_direction_vectors()[1])) + if dy != 0: + self.camera.euler_rotate(dy*dt*self.get_key_sensitivity(), + *(get_direction_vectors()[0])) + if dz != 0: + self.camera.euler_rotate(dz*dt*self.get_key_sensitivity(), + *(get_direction_vectors()[2])) + else: + self.camera.mouse_translate(0, 0, dx*dt*self.get_key_sensitivity(), + -dy*dt*self.get_key_sensitivity()) + + rz = 0 + if self.action['rotate_z_neg'] and not self.is_2D(): + rz -= 1 + if self.action['rotate_z_pos'] and not self.is_2D(): + rz += 1 + + if rz != 0: + self.camera.euler_rotate(rz*dt*self.get_key_sensitivity(), + *(get_basis_vectors()[2])) + + if self.action['reset_camera']: + self.camera.reset() + + if self.action['rot_preset_xy']: + self.camera.set_rot_preset('xy') + if self.action['rot_preset_xz']: + self.camera.set_rot_preset('xz') + if self.action['rot_preset_yz']: + self.camera.set_rot_preset('yz') + if self.action['rot_preset_perspective']: + self.camera.set_rot_preset('perspective') + + if self.action['toggle_axes']: + self.action['toggle_axes'] = False + self.camera.axes.toggle_visible() + + if self.action['toggle_axe_colors']: + self.action['toggle_axe_colors'] = False + self.camera.axes.toggle_colors() + + if self.action['save_image']: + self.action['save_image'] = False + self.window.plot.saveimage() + + return True + + def get_mouse_sensitivity(self): + if self.action['modify_sensitivity']: + return self.modified_mouse_sensitivity + else: + return self.normal_mouse_sensitivity + + def get_key_sensitivity(self): + if self.action['modify_sensitivity']: + return self.modified_key_sensitivity + else: + return self.normal_key_sensitivity + + def on_key_press(self, symbol, modifiers): + if symbol in self.keymap: + self.action[self.keymap[symbol]] = True + + def on_key_release(self, symbol, modifiers): + if symbol in self.keymap: + self.action[self.keymap[symbol]] = False + + def on_mouse_drag(self, x, y, dx, dy, buttons, modifiers): + if buttons & LEFT: + if self.is_2D(): + self.camera.mouse_translate(x, y, dx, dy) + else: + self.camera.spherical_rotate((x - dx, y - dy), (x, y), + self.get_mouse_sensitivity()) + if buttons & MIDDLE: + self.camera.zoom_relative([1, -1][self.invert_mouse_zoom]*dy, + self.get_mouse_sensitivity()/20.0) + if buttons & RIGHT: + self.camera.mouse_translate(x, y, dx, dy) + + def on_mouse_scroll(self, x, y, dx, dy): + self.camera.zoom_relative([1, -1][self.invert_mouse_zoom]*dy, + self.get_mouse_sensitivity()) + + def is_2D(self): + functions = self.window.plot._functions + for i in functions: + if len(functions[i].i_vars) > 1 or len(functions[i].d_vars) > 2: + return False + return True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_curve.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_curve.py new file mode 100644 index 0000000000000000000000000000000000000000..6b97dac843f58c76694d424f0b0b7e3499ba5202 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_curve.py @@ -0,0 +1,82 @@ +import pyglet.gl as pgl +from sympy.core import S +from sympy.plotting.pygletplot.plot_mode_base import PlotModeBase + + +class PlotCurve(PlotModeBase): + + style_override = 'wireframe' + + def _on_calculate_verts(self): + self.t_interval = self.intervals[0] + self.t_set = list(self.t_interval.frange()) + self.bounds = [[S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0]] + evaluate = self._get_evaluator() + + self._calculating_verts_pos = 0.0 + self._calculating_verts_len = float(self.t_interval.v_len) + + self.verts = [] + b = self.bounds + for t in self.t_set: + try: + _e = evaluate(t) # calculate vertex + except (NameError, ZeroDivisionError): + _e = None + if _e is not None: # update bounding box + for axis in range(3): + b[axis][0] = min([b[axis][0], _e[axis]]) + b[axis][1] = max([b[axis][1], _e[axis]]) + self.verts.append(_e) + self._calculating_verts_pos += 1.0 + + for axis in range(3): + b[axis][2] = b[axis][1] - b[axis][0] + if b[axis][2] == 0.0: + b[axis][2] = 1.0 + + self.push_wireframe(self.draw_verts(False)) + + def _on_calculate_cverts(self): + if not self.verts or not self.color: + return + + def set_work_len(n): + self._calculating_cverts_len = float(n) + + def inc_work_pos(): + self._calculating_cverts_pos += 1.0 + set_work_len(1) + self._calculating_cverts_pos = 0 + self.cverts = self.color.apply_to_curve(self.verts, + self.t_set, + set_len=set_work_len, + inc_pos=inc_work_pos) + self.push_wireframe(self.draw_verts(True)) + + def calculate_one_cvert(self, t): + vert = self.verts[t] + return self.color(vert[0], vert[1], vert[2], + self.t_set[t], None) + + def draw_verts(self, use_cverts): + def f(): + pgl.glBegin(pgl.GL_LINE_STRIP) + for t in range(len(self.t_set)): + p = self.verts[t] + if p is None: + pgl.glEnd() + pgl.glBegin(pgl.GL_LINE_STRIP) + continue + if use_cverts: + c = self.cverts[t] + if c is None: + c = (0, 0, 0) + pgl.glColor3f(*c) + else: + pgl.glColor3f(*self.default_wireframe_color) + pgl.glVertex3f(*p) + pgl.glEnd() + return f diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_interval.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_interval.py new file mode 100644 index 0000000000000000000000000000000000000000..085ab096915bbc4a3761b71736b4dd14f1ff779f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_interval.py @@ -0,0 +1,181 @@ +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import sympify +from sympy.core.numbers import Integer + + +class PlotInterval: + """ + """ + _v, _v_min, _v_max, _v_steps = None, None, None, None + + def require_all_args(f): + def check(self, *args, **kwargs): + for g in [self._v, self._v_min, self._v_max, self._v_steps]: + if g is None: + raise ValueError("PlotInterval is incomplete.") + return f(self, *args, **kwargs) + return check + + def __init__(self, *args): + if len(args) == 1: + if isinstance(args[0], PlotInterval): + self.fill_from(args[0]) + return + elif isinstance(args[0], str): + try: + args = eval(args[0]) + except TypeError: + s_eval_error = "Could not interpret string %s." + raise ValueError(s_eval_error % (args[0])) + elif isinstance(args[0], (tuple, list)): + args = args[0] + else: + raise ValueError("Not an interval.") + if not isinstance(args, (tuple, list)) or len(args) > 4: + f_error = "PlotInterval must be a tuple or list of length 4 or less." + raise ValueError(f_error) + + args = list(args) + if len(args) > 0 and (args[0] is None or isinstance(args[0], Symbol)): + self.v = args.pop(0) + if len(args) in [2, 3]: + self.v_min = args.pop(0) + self.v_max = args.pop(0) + if len(args) == 1: + self.v_steps = args.pop(0) + elif len(args) == 1: + self.v_steps = args.pop(0) + + def get_v(self): + return self._v + + def set_v(self, v): + if v is None: + self._v = None + return + if not isinstance(v, Symbol): + raise ValueError("v must be a SymPy Symbol.") + self._v = v + + def get_v_min(self): + return self._v_min + + def set_v_min(self, v_min): + if v_min is None: + self._v_min = None + return + try: + self._v_min = sympify(v_min) + float(self._v_min.evalf()) + except TypeError: + raise ValueError("v_min could not be interpreted as a number.") + + def get_v_max(self): + return self._v_max + + def set_v_max(self, v_max): + if v_max is None: + self._v_max = None + return + try: + self._v_max = sympify(v_max) + float(self._v_max.evalf()) + except TypeError: + raise ValueError("v_max could not be interpreted as a number.") + + def get_v_steps(self): + return self._v_steps + + def set_v_steps(self, v_steps): + if v_steps is None: + self._v_steps = None + return + if isinstance(v_steps, int): + v_steps = Integer(v_steps) + elif not isinstance(v_steps, Integer): + raise ValueError("v_steps must be an int or SymPy Integer.") + if v_steps <= S.Zero: + raise ValueError("v_steps must be positive.") + self._v_steps = v_steps + + @require_all_args + def get_v_len(self): + return self.v_steps + 1 + + v = property(get_v, set_v) + v_min = property(get_v_min, set_v_min) + v_max = property(get_v_max, set_v_max) + v_steps = property(get_v_steps, set_v_steps) + v_len = property(get_v_len) + + def fill_from(self, b): + if b.v is not None: + self.v = b.v + if b.v_min is not None: + self.v_min = b.v_min + if b.v_max is not None: + self.v_max = b.v_max + if b.v_steps is not None: + self.v_steps = b.v_steps + + @staticmethod + def try_parse(*args): + """ + Returns a PlotInterval if args can be interpreted + as such, otherwise None. + """ + if len(args) == 1 and isinstance(args[0], PlotInterval): + return args[0] + try: + return PlotInterval(*args) + except ValueError: + return None + + def _str_base(self): + return ",".join([str(self.v), str(self.v_min), + str(self.v_max), str(self.v_steps)]) + + def __repr__(self): + """ + A string representing the interval in class constructor form. + """ + return "PlotInterval(%s)" % (self._str_base()) + + def __str__(self): + """ + A string representing the interval in list form. + """ + return "[%s]" % (self._str_base()) + + @require_all_args + def assert_complete(self): + pass + + @require_all_args + def vrange(self): + """ + Yields v_steps+1 SymPy numbers ranging from + v_min to v_max. + """ + d = (self.v_max - self.v_min) / self.v_steps + for i in range(self.v_steps + 1): + a = self.v_min + (d * Integer(i)) + yield a + + @require_all_args + def vrange2(self): + """ + Yields v_steps pairs of SymPy numbers ranging from + (v_min, v_min + step) to (v_max - step, v_max). + """ + d = (self.v_max - self.v_min) / self.v_steps + a = self.v_min + (d * S.Zero) + for i in range(self.v_steps): + b = self.v_min + (d * Integer(i + 1)) + yield a, b + a = b + + def frange(self): + for i in self.vrange(): + yield float(i.evalf()) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode.py new file mode 100644 index 0000000000000000000000000000000000000000..f4ee00db9177b98b3259438949836fe5b69416c2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode.py @@ -0,0 +1,400 @@ +from .plot_interval import PlotInterval +from .plot_object import PlotObject +from .util import parse_option_string +from sympy.core.symbol import Symbol +from sympy.core.sympify import sympify +from sympy.geometry.entity import GeometryEntity +from sympy.utilities.iterables import is_sequence + + +class PlotMode(PlotObject): + """ + Grandparent class for plotting + modes. Serves as interface for + registration, lookup, and init + of modes. + + To create a new plot mode, + inherit from PlotModeBase + or one of its children, such + as PlotSurface or PlotCurve. + """ + + ## Class-level attributes + ## used to register and lookup + ## plot modes. See PlotModeBase + ## for descriptions and usage. + + i_vars, d_vars = '', '' + intervals = [] + aliases = [] + is_default = False + + ## Draw is the only method here which + ## is meant to be overridden in child + ## classes, and PlotModeBase provides + ## a base implementation. + def draw(self): + raise NotImplementedError() + + ## Everything else in this file has to + ## do with registration and retrieval + ## of plot modes. This is where I've + ## hidden much of the ugliness of automatic + ## plot mode divination... + + ## Plot mode registry data structures + _mode_alias_list = [] + _mode_map = { + 1: {1: {}, 2: {}}, + 2: {1: {}, 2: {}}, + 3: {1: {}, 2: {}}, + } # [d][i][alias_str]: class + _mode_default_map = { + 1: {}, + 2: {}, + 3: {}, + } # [d][i]: class + _i_var_max, _d_var_max = 2, 3 + + def __new__(cls, *args, **kwargs): + """ + This is the function which interprets + arguments given to Plot.__init__ and + Plot.__setattr__. Returns an initialized + instance of the appropriate child class. + """ + + newargs, newkwargs = PlotMode._extract_options(args, kwargs) + mode_arg = newkwargs.get('mode', '') + + # Interpret the arguments + d_vars, intervals = PlotMode._interpret_args(newargs) + i_vars = PlotMode._find_i_vars(d_vars, intervals) + i, d = max([len(i_vars), len(intervals)]), len(d_vars) + + # Find the appropriate mode + subcls = PlotMode._get_mode(mode_arg, i, d) + + # Create the object + o = object.__new__(subcls) + + # Do some setup for the mode instance + o.d_vars = d_vars + o._fill_i_vars(i_vars) + o._fill_intervals(intervals) + o.options = newkwargs + + return o + + @staticmethod + def _get_mode(mode_arg, i_var_count, d_var_count): + """ + Tries to return an appropriate mode class. + Intended to be called only by __new__. + + mode_arg + Can be a string or a class. If it is a + PlotMode subclass, it is simply returned. + If it is a string, it can an alias for + a mode or an empty string. In the latter + case, we try to find a default mode for + the i_var_count and d_var_count. + + i_var_count + The number of independent variables + needed to evaluate the d_vars. + + d_var_count + The number of dependent variables; + usually the number of functions to + be evaluated in plotting. + + For example, a Cartesian function y = f(x) has + one i_var (x) and one d_var (y). A parametric + form x,y,z = f(u,v), f(u,v), f(u,v) has two + two i_vars (u,v) and three d_vars (x,y,z). + """ + # if the mode_arg is simply a PlotMode class, + # check that the mode supports the numbers + # of independent and dependent vars, then + # return it + try: + m = None + if issubclass(mode_arg, PlotMode): + m = mode_arg + except TypeError: + pass + if m: + if not m._was_initialized: + raise ValueError(("To use unregistered plot mode %s " + "you must first call %s._init_mode().") + % (m.__name__, m.__name__)) + if d_var_count != m.d_var_count: + raise ValueError(("%s can only plot functions " + "with %i dependent variables.") + % (m.__name__, + m.d_var_count)) + if i_var_count > m.i_var_count: + raise ValueError(("%s cannot plot functions " + "with more than %i independent " + "variables.") + % (m.__name__, + m.i_var_count)) + return m + # If it is a string, there are two possibilities. + if isinstance(mode_arg, str): + i, d = i_var_count, d_var_count + if i > PlotMode._i_var_max: + raise ValueError(var_count_error(True, True)) + if d > PlotMode._d_var_max: + raise ValueError(var_count_error(False, True)) + # If the string is '', try to find a suitable + # default mode + if not mode_arg: + return PlotMode._get_default_mode(i, d) + # Otherwise, interpret the string as a mode + # alias (e.g. 'cartesian', 'parametric', etc) + else: + return PlotMode._get_aliased_mode(mode_arg, i, d) + else: + raise ValueError("PlotMode argument must be " + "a class or a string") + + @staticmethod + def _get_default_mode(i, d, i_vars=-1): + if i_vars == -1: + i_vars = i + try: + return PlotMode._mode_default_map[d][i] + except KeyError: + # Keep looking for modes in higher i var counts + # which support the given d var count until we + # reach the max i_var count. + if i < PlotMode._i_var_max: + return PlotMode._get_default_mode(i + 1, d, i_vars) + else: + raise ValueError(("Couldn't find a default mode " + "for %i independent and %i " + "dependent variables.") % (i_vars, d)) + + @staticmethod + def _get_aliased_mode(alias, i, d, i_vars=-1): + if i_vars == -1: + i_vars = i + if alias not in PlotMode._mode_alias_list: + raise ValueError(("Couldn't find a mode called" + " %s. Known modes: %s.") + % (alias, ", ".join(PlotMode._mode_alias_list))) + try: + return PlotMode._mode_map[d][i][alias] + except TypeError: + # Keep looking for modes in higher i var counts + # which support the given d var count and alias + # until we reach the max i_var count. + if i < PlotMode._i_var_max: + return PlotMode._get_aliased_mode(alias, i + 1, d, i_vars) + else: + raise ValueError(("Couldn't find a %s mode " + "for %i independent and %i " + "dependent variables.") + % (alias, i_vars, d)) + + @classmethod + def _register(cls): + """ + Called once for each user-usable plot mode. + For Cartesian2D, it is invoked after the + class definition: Cartesian2D._register() + """ + name = cls.__name__ + cls._init_mode() + + try: + i, d = cls.i_var_count, cls.d_var_count + # Add the mode to _mode_map under all + # given aliases + for a in cls.aliases: + if a not in PlotMode._mode_alias_list: + # Also track valid aliases, so + # we can quickly know when given + # an invalid one in _get_mode. + PlotMode._mode_alias_list.append(a) + PlotMode._mode_map[d][i][a] = cls + if cls.is_default: + # If this mode was marked as the + # default for this d,i combination, + # also set that. + PlotMode._mode_default_map[d][i] = cls + + except Exception as e: + raise RuntimeError(("Failed to register " + "plot mode %s. Reason: %s") + % (name, (str(e)))) + + @classmethod + def _init_mode(cls): + """ + Initializes the plot mode based on + the 'mode-specific parameters' above. + Only intended to be called by + PlotMode._register(). To use a mode without + registering it, you can directly call + ModeSubclass._init_mode(). + """ + def symbols_list(symbol_str): + return [Symbol(s) for s in symbol_str] + + # Convert the vars strs into + # lists of symbols. + cls.i_vars = symbols_list(cls.i_vars) + cls.d_vars = symbols_list(cls.d_vars) + + # Var count is used often, calculate + # it once here + cls.i_var_count = len(cls.i_vars) + cls.d_var_count = len(cls.d_vars) + + if cls.i_var_count > PlotMode._i_var_max: + raise ValueError(var_count_error(True, False)) + if cls.d_var_count > PlotMode._d_var_max: + raise ValueError(var_count_error(False, False)) + + # Try to use first alias as primary_alias + if len(cls.aliases) > 0: + cls.primary_alias = cls.aliases[0] + else: + cls.primary_alias = cls.__name__ + + di = cls.intervals + if len(di) != cls.i_var_count: + raise ValueError("Plot mode must provide a " + "default interval for each i_var.") + for i in range(cls.i_var_count): + # default intervals must be given [min,max,steps] + # (no var, but they must be in the same order as i_vars) + if len(di[i]) != 3: + raise ValueError("length should be equal to 3") + + # Initialize an incomplete interval, + # to later be filled with a var when + # the mode is instantiated. + di[i] = PlotInterval(None, *di[i]) + + # To prevent people from using modes + # without these required fields set up. + cls._was_initialized = True + + _was_initialized = False + + ## Initializer Helper Methods + + @staticmethod + def _find_i_vars(functions, intervals): + i_vars = [] + + # First, collect i_vars in the + # order they are given in any + # intervals. + for i in intervals: + if i.v is None: + continue + elif i.v in i_vars: + raise ValueError(("Multiple intervals given " + "for %s.") % (str(i.v))) + i_vars.append(i.v) + + # Then, find any remaining + # i_vars in given functions + # (aka d_vars) + for f in functions: + for a in f.free_symbols: + if a not in i_vars: + i_vars.append(a) + + return i_vars + + def _fill_i_vars(self, i_vars): + # copy default i_vars + self.i_vars = [Symbol(str(i)) for i in self.i_vars] + # replace with given i_vars + for i in range(len(i_vars)): + self.i_vars[i] = i_vars[i] + + def _fill_intervals(self, intervals): + # copy default intervals + self.intervals = [PlotInterval(i) for i in self.intervals] + # track i_vars used so far + v_used = [] + # fill copy of default + # intervals with given info + for i in range(len(intervals)): + self.intervals[i].fill_from(intervals[i]) + if self.intervals[i].v is not None: + v_used.append(self.intervals[i].v) + # Find any orphan intervals and + # assign them i_vars + for i in range(len(self.intervals)): + if self.intervals[i].v is None: + u = [v for v in self.i_vars if v not in v_used] + if len(u) == 0: + raise ValueError("length should not be equal to 0") + self.intervals[i].v = u[0] + v_used.append(u[0]) + + @staticmethod + def _interpret_args(args): + interval_wrong_order = "PlotInterval %s was given before any function(s)." + interpret_error = "Could not interpret %s as a function or interval." + + functions, intervals = [], [] + if isinstance(args[0], GeometryEntity): + for coords in list(args[0].arbitrary_point()): + functions.append(coords) + intervals.append(PlotInterval.try_parse(args[0].plot_interval())) + else: + for a in args: + i = PlotInterval.try_parse(a) + if i is not None: + if len(functions) == 0: + raise ValueError(interval_wrong_order % (str(i))) + else: + intervals.append(i) + else: + if is_sequence(a, include=str): + raise ValueError(interpret_error % (str(a))) + try: + f = sympify(a) + functions.append(f) + except TypeError: + raise ValueError(interpret_error % str(a)) + + return functions, intervals + + @staticmethod + def _extract_options(args, kwargs): + newkwargs, newargs = {}, [] + for a in args: + if isinstance(a, str): + newkwargs = dict(newkwargs, **parse_option_string(a)) + else: + newargs.append(a) + newkwargs = dict(newkwargs, **kwargs) + return newargs, newkwargs + + +def var_count_error(is_independent, is_plotting): + """ + Used to format an error message which differs + slightly in 4 places. + """ + if is_plotting: + v = "Plotting" + else: + v = "Registering plot modes" + if is_independent: + n, s = PlotMode._i_var_max, "independent" + else: + n, s = PlotMode._d_var_max, "dependent" + return ("%s with more than %i %s variables " + "is not supported.") % (v, n, s) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode_base.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode_base.py new file mode 100644 index 0000000000000000000000000000000000000000..2c6503650afda122e271bdecb2365c8fa20f2376 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_mode_base.py @@ -0,0 +1,378 @@ +import pyglet.gl as pgl +from sympy.core import S +from sympy.plotting.pygletplot.color_scheme import ColorScheme +from sympy.plotting.pygletplot.plot_mode import PlotMode +from sympy.utilities.iterables import is_sequence +from time import sleep +from threading import Thread, Event, RLock +import warnings + + +class PlotModeBase(PlotMode): + """ + Intended parent class for plotting + modes. Provides base functionality + in conjunction with its parent, + PlotMode. + """ + + ## + ## Class-Level Attributes + ## + + """ + The following attributes are meant + to be set at the class level, and serve + as parameters to the plot mode registry + (in PlotMode). See plot_modes.py for + concrete examples. + """ + + """ + i_vars + 'x' for Cartesian2D + 'xy' for Cartesian3D + etc. + + d_vars + 'y' for Cartesian2D + 'r' for Polar + etc. + """ + i_vars, d_vars = '', '' + + """ + intervals + Default intervals for each i_var, and in the + same order. Specified [min, max, steps]. + No variable can be given (it is bound later). + """ + intervals = [] + + """ + aliases + A list of strings which can be used to + access this mode. + 'cartesian' for Cartesian2D and Cartesian3D + 'polar' for Polar + 'cylindrical', 'polar' for Cylindrical + + Note that _init_mode chooses the first alias + in the list as the mode's primary_alias, which + will be displayed to the end user in certain + contexts. + """ + aliases = [] + + """ + is_default + Whether to set this mode as the default + for arguments passed to PlotMode() containing + the same number of d_vars as this mode and + at most the same number of i_vars. + """ + is_default = False + + """ + All of the above attributes are defined in PlotMode. + The following ones are specific to PlotModeBase. + """ + + """ + A list of the render styles. Do not modify. + """ + styles = {'wireframe': 1, 'solid': 2, 'both': 3} + + """ + style_override + Always use this style if not blank. + """ + style_override = '' + + """ + default_wireframe_color + default_solid_color + Can be used when color is None or being calculated. + Used by PlotCurve and PlotSurface, but not anywhere + in PlotModeBase. + """ + + default_wireframe_color = (0.85, 0.85, 0.85) + default_solid_color = (0.6, 0.6, 0.9) + default_rot_preset = 'xy' + + ## + ## Instance-Level Attributes + ## + + ## 'Abstract' member functions + def _get_evaluator(self): + if self.use_lambda_eval: + try: + e = self._get_lambda_evaluator() + return e + except Exception: + warnings.warn("\nWarning: creating lambda evaluator failed. " + "Falling back on SymPy subs evaluator.") + return self._get_sympy_evaluator() + + def _get_sympy_evaluator(self): + raise NotImplementedError() + + def _get_lambda_evaluator(self): + raise NotImplementedError() + + def _on_calculate_verts(self): + raise NotImplementedError() + + def _on_calculate_cverts(self): + raise NotImplementedError() + + ## Base member functions + def __init__(self, *args, bounds_callback=None, **kwargs): + self.verts = [] + self.cverts = [] + self.bounds = [[S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0]] + self.cbounds = [[S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0]] + + self._draw_lock = RLock() + + self._calculating_verts = Event() + self._calculating_cverts = Event() + self._calculating_verts_pos = 0.0 + self._calculating_verts_len = 0.0 + self._calculating_cverts_pos = 0.0 + self._calculating_cverts_len = 0.0 + + self._max_render_stack_size = 3 + self._draw_wireframe = [-1] + self._draw_solid = [-1] + + self._style = None + self._color = None + + self.predraw = [] + self.postdraw = [] + + self.use_lambda_eval = self.options.pop('use_sympy_eval', None) is None + self.style = self.options.pop('style', '') + self.color = self.options.pop('color', 'rainbow') + self.bounds_callback = bounds_callback + + self._on_calculate() + + def synchronized(f): + def w(self, *args, **kwargs): + self._draw_lock.acquire() + try: + r = f(self, *args, **kwargs) + return r + finally: + self._draw_lock.release() + return w + + @synchronized + def push_wireframe(self, function): + """ + Push a function which performs gl commands + used to build a display list. (The list is + built outside of the function) + """ + assert callable(function) + self._draw_wireframe.append(function) + if len(self._draw_wireframe) > self._max_render_stack_size: + del self._draw_wireframe[1] # leave marker element + + @synchronized + def push_solid(self, function): + """ + Push a function which performs gl commands + used to build a display list. (The list is + built outside of the function) + """ + assert callable(function) + self._draw_solid.append(function) + if len(self._draw_solid) > self._max_render_stack_size: + del self._draw_solid[1] # leave marker element + + def _create_display_list(self, function): + dl = pgl.glGenLists(1) + pgl.glNewList(dl, pgl.GL_COMPILE) + function() + pgl.glEndList() + return dl + + def _render_stack_top(self, render_stack): + top = render_stack[-1] + if top == -1: + return -1 # nothing to display + elif callable(top): + dl = self._create_display_list(top) + render_stack[-1] = (dl, top) + return dl # display newly added list + elif len(top) == 2: + if pgl.GL_TRUE == pgl.glIsList(top[0]): + return top[0] # display stored list + dl = self._create_display_list(top[1]) + render_stack[-1] = (dl, top[1]) + return dl # display regenerated list + + def _draw_solid_display_list(self, dl): + pgl.glPushAttrib(pgl.GL_ENABLE_BIT | pgl.GL_POLYGON_BIT) + pgl.glPolygonMode(pgl.GL_FRONT_AND_BACK, pgl.GL_FILL) + pgl.glCallList(dl) + pgl.glPopAttrib() + + def _draw_wireframe_display_list(self, dl): + pgl.glPushAttrib(pgl.GL_ENABLE_BIT | pgl.GL_POLYGON_BIT) + pgl.glPolygonMode(pgl.GL_FRONT_AND_BACK, pgl.GL_LINE) + pgl.glEnable(pgl.GL_POLYGON_OFFSET_LINE) + pgl.glPolygonOffset(-0.005, -50.0) + pgl.glCallList(dl) + pgl.glPopAttrib() + + @synchronized + def draw(self): + for f in self.predraw: + if callable(f): + f() + if self.style_override: + style = self.styles[self.style_override] + else: + style = self.styles[self._style] + # Draw solid component if style includes solid + if style & 2: + dl = self._render_stack_top(self._draw_solid) + if dl > 0 and pgl.GL_TRUE == pgl.glIsList(dl): + self._draw_solid_display_list(dl) + # Draw wireframe component if style includes wireframe + if style & 1: + dl = self._render_stack_top(self._draw_wireframe) + if dl > 0 and pgl.GL_TRUE == pgl.glIsList(dl): + self._draw_wireframe_display_list(dl) + for f in self.postdraw: + if callable(f): + f() + + def _on_change_color(self, color): + Thread(target=self._calculate_cverts).start() + + def _on_calculate(self): + Thread(target=self._calculate_all).start() + + def _calculate_all(self): + self._calculate_verts() + self._calculate_cverts() + + def _calculate_verts(self): + if self._calculating_verts.is_set(): + return + self._calculating_verts.set() + try: + self._on_calculate_verts() + finally: + self._calculating_verts.clear() + if callable(self.bounds_callback): + self.bounds_callback() + + def _calculate_cverts(self): + if self._calculating_verts.is_set(): + return + while self._calculating_cverts.is_set(): + sleep(0) # wait for previous calculation + self._calculating_cverts.set() + try: + self._on_calculate_cverts() + finally: + self._calculating_cverts.clear() + + def _get_calculating_verts(self): + return self._calculating_verts.is_set() + + def _get_calculating_verts_pos(self): + return self._calculating_verts_pos + + def _get_calculating_verts_len(self): + return self._calculating_verts_len + + def _get_calculating_cverts(self): + return self._calculating_cverts.is_set() + + def _get_calculating_cverts_pos(self): + return self._calculating_cverts_pos + + def _get_calculating_cverts_len(self): + return self._calculating_cverts_len + + ## Property handlers + def _get_style(self): + return self._style + + @synchronized + def _set_style(self, v): + if v is None: + return + if v == '': + step_max = 0 + for i in self.intervals: + if i.v_steps is None: + continue + step_max = max([step_max, int(i.v_steps)]) + v = ['both', 'solid'][step_max > 40] + if v not in self.styles: + raise ValueError("v should be there in self.styles") + if v == self._style: + return + self._style = v + + def _get_color(self): + return self._color + + @synchronized + def _set_color(self, v): + try: + if v is not None: + if is_sequence(v): + v = ColorScheme(*v) + else: + v = ColorScheme(v) + if repr(v) == repr(self._color): + return + self._on_change_color(v) + self._color = v + except Exception as e: + raise RuntimeError("Color change failed. " + "Reason: %s" % (str(e))) + + style = property(_get_style, _set_style) + color = property(_get_color, _set_color) + + calculating_verts = property(_get_calculating_verts) + calculating_verts_pos = property(_get_calculating_verts_pos) + calculating_verts_len = property(_get_calculating_verts_len) + + calculating_cverts = property(_get_calculating_cverts) + calculating_cverts_pos = property(_get_calculating_cverts_pos) + calculating_cverts_len = property(_get_calculating_cverts_len) + + ## String representations + + def __str__(self): + f = ", ".join(str(d) for d in self.d_vars) + o = "'mode=%s'" % (self.primary_alias) + return ", ".join([f, o]) + + def __repr__(self): + f = ", ".join(str(d) for d in self.d_vars) + i = ", ".join(str(i) for i in self.intervals) + d = [('mode', self.primary_alias), + ('color', str(self.color)), + ('style', str(self.style))] + + o = "'%s'" % ("; ".join("%s=%s" % (k, v) + for k, v in d if v != 'None')) + return ", ".join([f, i, o]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_modes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_modes.py new file mode 100644 index 0000000000000000000000000000000000000000..e78e0b4ce291b071f684fa3ffc02f456dffe0023 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_modes.py @@ -0,0 +1,209 @@ +from sympy.utilities.lambdify import lambdify +from sympy.core.numbers import pi +from sympy.functions import sin, cos +from sympy.plotting.pygletplot.plot_curve import PlotCurve +from sympy.plotting.pygletplot.plot_surface import PlotSurface + +from math import sin as p_sin +from math import cos as p_cos + + +def float_vec3(f): + def inner(*args): + v = f(*args) + return float(v[0]), float(v[1]), float(v[2]) + return inner + + +class Cartesian2D(PlotCurve): + i_vars, d_vars = 'x', 'y' + intervals = [[-5, 5, 100]] + aliases = ['cartesian'] + is_default = True + + def _get_sympy_evaluator(self): + fy = self.d_vars[0] + x = self.t_interval.v + + @float_vec3 + def e(_x): + return (_x, fy.subs(x, _x), 0.0) + return e + + def _get_lambda_evaluator(self): + fy = self.d_vars[0] + x = self.t_interval.v + return lambdify([x], [x, fy, 0.0]) + + +class Cartesian3D(PlotSurface): + i_vars, d_vars = 'xy', 'z' + intervals = [[-1, 1, 40], [-1, 1, 40]] + aliases = ['cartesian', 'monge'] + is_default = True + + def _get_sympy_evaluator(self): + fz = self.d_vars[0] + x = self.u_interval.v + y = self.v_interval.v + + @float_vec3 + def e(_x, _y): + return (_x, _y, fz.subs(x, _x).subs(y, _y)) + return e + + def _get_lambda_evaluator(self): + fz = self.d_vars[0] + x = self.u_interval.v + y = self.v_interval.v + return lambdify([x, y], [x, y, fz]) + + +class ParametricCurve2D(PlotCurve): + i_vars, d_vars = 't', 'xy' + intervals = [[0, 2*pi, 100]] + aliases = ['parametric'] + is_default = True + + def _get_sympy_evaluator(self): + fx, fy = self.d_vars + t = self.t_interval.v + + @float_vec3 + def e(_t): + return (fx.subs(t, _t), fy.subs(t, _t), 0.0) + return e + + def _get_lambda_evaluator(self): + fx, fy = self.d_vars + t = self.t_interval.v + return lambdify([t], [fx, fy, 0.0]) + + +class ParametricCurve3D(PlotCurve): + i_vars, d_vars = 't', 'xyz' + intervals = [[0, 2*pi, 100]] + aliases = ['parametric'] + is_default = True + + def _get_sympy_evaluator(self): + fx, fy, fz = self.d_vars + t = self.t_interval.v + + @float_vec3 + def e(_t): + return (fx.subs(t, _t), fy.subs(t, _t), fz.subs(t, _t)) + return e + + def _get_lambda_evaluator(self): + fx, fy, fz = self.d_vars + t = self.t_interval.v + return lambdify([t], [fx, fy, fz]) + + +class ParametricSurface(PlotSurface): + i_vars, d_vars = 'uv', 'xyz' + intervals = [[-1, 1, 40], [-1, 1, 40]] + aliases = ['parametric'] + is_default = True + + def _get_sympy_evaluator(self): + fx, fy, fz = self.d_vars + u = self.u_interval.v + v = self.v_interval.v + + @float_vec3 + def e(_u, _v): + return (fx.subs(u, _u).subs(v, _v), + fy.subs(u, _u).subs(v, _v), + fz.subs(u, _u).subs(v, _v)) + return e + + def _get_lambda_evaluator(self): + fx, fy, fz = self.d_vars + u = self.u_interval.v + v = self.v_interval.v + return lambdify([u, v], [fx, fy, fz]) + + +class Polar(PlotCurve): + i_vars, d_vars = 't', 'r' + intervals = [[0, 2*pi, 100]] + aliases = ['polar'] + is_default = False + + def _get_sympy_evaluator(self): + fr = self.d_vars[0] + t = self.t_interval.v + + def e(_t): + _r = float(fr.subs(t, _t)) + return (_r*p_cos(_t), _r*p_sin(_t), 0.0) + return e + + def _get_lambda_evaluator(self): + fr = self.d_vars[0] + t = self.t_interval.v + fx, fy = fr*cos(t), fr*sin(t) + return lambdify([t], [fx, fy, 0.0]) + + +class Cylindrical(PlotSurface): + i_vars, d_vars = 'th', 'r' + intervals = [[0, 2*pi, 40], [-1, 1, 20]] + aliases = ['cylindrical', 'polar'] + is_default = False + + def _get_sympy_evaluator(self): + fr = self.d_vars[0] + t = self.u_interval.v + h = self.v_interval.v + + def e(_t, _h): + _r = float(fr.subs(t, _t).subs(h, _h)) + return (_r*p_cos(_t), _r*p_sin(_t), _h) + return e + + def _get_lambda_evaluator(self): + fr = self.d_vars[0] + t = self.u_interval.v + h = self.v_interval.v + fx, fy = fr*cos(t), fr*sin(t) + return lambdify([t, h], [fx, fy, h]) + + +class Spherical(PlotSurface): + i_vars, d_vars = 'tp', 'r' + intervals = [[0, 2*pi, 40], [0, pi, 20]] + aliases = ['spherical'] + is_default = False + + def _get_sympy_evaluator(self): + fr = self.d_vars[0] + t = self.u_interval.v + p = self.v_interval.v + + def e(_t, _p): + _r = float(fr.subs(t, _t).subs(p, _p)) + return (_r*p_cos(_t)*p_sin(_p), + _r*p_sin(_t)*p_sin(_p), + _r*p_cos(_p)) + return e + + def _get_lambda_evaluator(self): + fr = self.d_vars[0] + t = self.u_interval.v + p = self.v_interval.v + fx = fr * cos(t) * sin(p) + fy = fr * sin(t) * sin(p) + fz = fr * cos(p) + return lambdify([t, p], [fx, fy, fz]) + +Cartesian2D._register() +Cartesian3D._register() +ParametricCurve2D._register() +ParametricCurve3D._register() +ParametricSurface._register() +Polar._register() +Cylindrical._register() +Spherical._register() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_object.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_object.py new file mode 100644 index 0000000000000000000000000000000000000000..e51040fb8b1a52c49d849b96692f6c0dba329d75 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_object.py @@ -0,0 +1,17 @@ +class PlotObject: + """ + Base class for objects which can be displayed in + a Plot. + """ + visible = True + + def _draw(self): + if self.visible: + self.draw() + + def draw(self): + """ + OpenGL rendering code for the plot object. + Override in base class. + """ + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_rotation.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_rotation.py new file mode 100644 index 0000000000000000000000000000000000000000..11ede2d1c3e74e5470cf601348e494c35720b9a8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_rotation.py @@ -0,0 +1,68 @@ +try: + from ctypes import c_float +except ImportError: + pass + +import pyglet.gl as pgl +from math import sqrt as _sqrt, acos as _acos, pi + + +def cross(a, b): + return (a[1] * b[2] - a[2] * b[1], + a[2] * b[0] - a[0] * b[2], + a[0] * b[1] - a[1] * b[0]) + + +def dot(a, b): + return a[0] * b[0] + a[1] * b[1] + a[2] * b[2] + + +def mag(a): + return _sqrt(a[0]**2 + a[1]**2 + a[2]**2) + + +def norm(a): + m = mag(a) + return (a[0] / m, a[1] / m, a[2] / m) + + +def get_sphere_mapping(x, y, width, height): + x = min([max([x, 0]), width]) + y = min([max([y, 0]), height]) + + sr = _sqrt((width/2)**2 + (height/2)**2) + sx = ((x - width / 2) / sr) + sy = ((y - height / 2) / sr) + + sz = 1.0 - sx**2 - sy**2 + + if sz > 0.0: + sz = _sqrt(sz) + return (sx, sy, sz) + else: + sz = 0 + return norm((sx, sy, sz)) + +rad2deg = 180.0 / pi + + +def get_spherical_rotatation(p1, p2, width, height, theta_multiplier): + v1 = get_sphere_mapping(p1[0], p1[1], width, height) + v2 = get_sphere_mapping(p2[0], p2[1], width, height) + + d = min(max([dot(v1, v2), -1]), 1) + + if abs(d - 1.0) < 0.000001: + return None + + raxis = norm( cross(v1, v2) ) + rtheta = theta_multiplier * rad2deg * _acos(d) + + pgl.glPushMatrix() + pgl.glLoadIdentity() + pgl.glRotatef(rtheta, *raxis) + mat = (c_float*16)() + pgl.glGetFloatv(pgl.GL_MODELVIEW_MATRIX, mat) + pgl.glPopMatrix() + + return mat diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_surface.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_surface.py new file mode 100644 index 0000000000000000000000000000000000000000..ed421eebb441d193f4d9b763f56e146c11e5a42c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_surface.py @@ -0,0 +1,102 @@ +import pyglet.gl as pgl + +from sympy.core import S +from sympy.plotting.pygletplot.plot_mode_base import PlotModeBase + + +class PlotSurface(PlotModeBase): + + default_rot_preset = 'perspective' + + def _on_calculate_verts(self): + self.u_interval = self.intervals[0] + self.u_set = list(self.u_interval.frange()) + self.v_interval = self.intervals[1] + self.v_set = list(self.v_interval.frange()) + self.bounds = [[S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0]] + evaluate = self._get_evaluator() + + self._calculating_verts_pos = 0.0 + self._calculating_verts_len = float( + self.u_interval.v_len*self.v_interval.v_len) + + verts = [] + b = self.bounds + for u in self.u_set: + column = [] + for v in self.v_set: + try: + _e = evaluate(u, v) # calculate vertex + except ZeroDivisionError: + _e = None + if _e is not None: # update bounding box + for axis in range(3): + b[axis][0] = min([b[axis][0], _e[axis]]) + b[axis][1] = max([b[axis][1], _e[axis]]) + column.append(_e) + self._calculating_verts_pos += 1.0 + + verts.append(column) + for axis in range(3): + b[axis][2] = b[axis][1] - b[axis][0] + if b[axis][2] == 0.0: + b[axis][2] = 1.0 + + self.verts = verts + self.push_wireframe(self.draw_verts(False, False)) + self.push_solid(self.draw_verts(False, True)) + + def _on_calculate_cverts(self): + if not self.verts or not self.color: + return + + def set_work_len(n): + self._calculating_cverts_len = float(n) + + def inc_work_pos(): + self._calculating_cverts_pos += 1.0 + set_work_len(1) + self._calculating_cverts_pos = 0 + self.cverts = self.color.apply_to_surface(self.verts, + self.u_set, + self.v_set, + set_len=set_work_len, + inc_pos=inc_work_pos) + self.push_solid(self.draw_verts(True, True)) + + def calculate_one_cvert(self, u, v): + vert = self.verts[u][v] + return self.color(vert[0], vert[1], vert[2], + self.u_set[u], self.v_set[v]) + + def draw_verts(self, use_cverts, use_solid_color): + def f(): + for u in range(1, len(self.u_set)): + pgl.glBegin(pgl.GL_QUAD_STRIP) + for v in range(len(self.v_set)): + pa = self.verts[u - 1][v] + pb = self.verts[u][v] + if pa is None or pb is None: + pgl.glEnd() + pgl.glBegin(pgl.GL_QUAD_STRIP) + continue + if use_cverts: + ca = self.cverts[u - 1][v] + cb = self.cverts[u][v] + if ca is None: + ca = (0, 0, 0) + if cb is None: + cb = (0, 0, 0) + else: + if use_solid_color: + ca = cb = self.default_solid_color + else: + ca = cb = self.default_wireframe_color + pgl.glColor3f(*ca) + pgl.glVertex3f(*pa) + pgl.glColor3f(*cb) + pgl.glVertex3f(*pb) + pgl.glEnd() + return f diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_window.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_window.py new file mode 100644 index 0000000000000000000000000000000000000000..d9df4cc453acb05d7c2d871e9e8efeb36905de5d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/plot_window.py @@ -0,0 +1,144 @@ +from time import perf_counter + + +import pyglet.gl as pgl + +from sympy.plotting.pygletplot.managed_window import ManagedWindow +from sympy.plotting.pygletplot.plot_camera import PlotCamera +from sympy.plotting.pygletplot.plot_controller import PlotController + + +class PlotWindow(ManagedWindow): + + def __init__(self, plot, antialiasing=True, ortho=False, + invert_mouse_zoom=False, linewidth=1.5, caption="SymPy Plot", + **kwargs): + """ + Named Arguments + =============== + + antialiasing = True + True OR False + ortho = False + True OR False + invert_mouse_zoom = False + True OR False + """ + self.plot = plot + + self.camera = None + self._calculating = False + + self.antialiasing = antialiasing + self.ortho = ortho + self.invert_mouse_zoom = invert_mouse_zoom + self.linewidth = linewidth + self.title = caption + self.last_caption_update = 0 + self.caption_update_interval = 0.2 + self.drawing_first_object = True + + super().__init__(**kwargs) + + def setup(self): + self.camera = PlotCamera(self, ortho=self.ortho) + self.controller = PlotController(self, + invert_mouse_zoom=self.invert_mouse_zoom) + self.push_handlers(self.controller) + + pgl.glClearColor(1.0, 1.0, 1.0, 0.0) + pgl.glClearDepth(1.0) + + pgl.glDepthFunc(pgl.GL_LESS) + pgl.glEnable(pgl.GL_DEPTH_TEST) + + pgl.glEnable(pgl.GL_LINE_SMOOTH) + pgl.glShadeModel(pgl.GL_SMOOTH) + pgl.glLineWidth(self.linewidth) + + pgl.glEnable(pgl.GL_BLEND) + pgl.glBlendFunc(pgl.GL_SRC_ALPHA, pgl.GL_ONE_MINUS_SRC_ALPHA) + + if self.antialiasing: + pgl.glHint(pgl.GL_LINE_SMOOTH_HINT, pgl.GL_NICEST) + pgl.glHint(pgl.GL_POLYGON_SMOOTH_HINT, pgl.GL_NICEST) + + self.camera.setup_projection() + + def on_resize(self, w, h): + super().on_resize(w, h) + if self.camera is not None: + self.camera.setup_projection() + + def update(self, dt): + self.controller.update(dt) + + def draw(self): + self.plot._render_lock.acquire() + self.camera.apply_transformation() + + calc_verts_pos, calc_verts_len = 0, 0 + calc_cverts_pos, calc_cverts_len = 0, 0 + + should_update_caption = (perf_counter() - self.last_caption_update > + self.caption_update_interval) + + if len(self.plot._functions.values()) == 0: + self.drawing_first_object = True + + iterfunctions = iter(self.plot._functions.values()) + + for r in iterfunctions: + if self.drawing_first_object: + self.camera.set_rot_preset(r.default_rot_preset) + self.drawing_first_object = False + + pgl.glPushMatrix() + r._draw() + pgl.glPopMatrix() + + # might as well do this while we are + # iterating and have the lock rather + # than locking and iterating twice + # per frame: + + if should_update_caption: + try: + if r.calculating_verts: + calc_verts_pos += r.calculating_verts_pos + calc_verts_len += r.calculating_verts_len + if r.calculating_cverts: + calc_cverts_pos += r.calculating_cverts_pos + calc_cverts_len += r.calculating_cverts_len + except ValueError: + pass + + for r in self.plot._pobjects: + pgl.glPushMatrix() + r._draw() + pgl.glPopMatrix() + + if should_update_caption: + self.update_caption(calc_verts_pos, calc_verts_len, + calc_cverts_pos, calc_cverts_len) + self.last_caption_update = perf_counter() + + if self.plot._screenshot: + self.plot._screenshot._execute_saving() + + self.plot._render_lock.release() + + def update_caption(self, calc_verts_pos, calc_verts_len, + calc_cverts_pos, calc_cverts_len): + caption = self.title + if calc_verts_len or calc_cverts_len: + caption += " (calculating" + if calc_verts_len > 0: + p = (calc_verts_pos / calc_verts_len) * 100 + caption += " vertices %i%%" % (p) + if calc_cverts_len > 0: + p = (calc_cverts_pos / calc_cverts_len) * 100 + caption += " colors %i%%" % (p) + caption += ")" + if self.caption != caption: + self.set_caption(caption) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/tests/test_plotting.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/tests/test_plotting.py new file mode 100644 index 0000000000000000000000000000000000000000..ddc4aaf3621a8c9056ce0d81c89ca6a0a681bbdb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/tests/test_plotting.py @@ -0,0 +1,88 @@ +from sympy.external.importtools import import_module + +disabled = False + +# if pyglet.gl fails to import, e.g. opengl is missing, we disable the tests +pyglet_gl = import_module("pyglet.gl", catch=(OSError,)) +pyglet_window = import_module("pyglet.window", catch=(OSError,)) +if not pyglet_gl or not pyglet_window: + disabled = True + + +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.trigonometric import (cos, sin) +x, y, z = symbols('x, y, z') + + +def test_plot_2d(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(x, [x, -5, 5, 4], visible=False) + p.wait_for_calculations() + + +def test_plot_2d_discontinuous(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(1/x, [x, -1, 1, 2], visible=False) + p.wait_for_calculations() + + +def test_plot_3d(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(x*y, [x, -5, 5, 5], [y, -5, 5, 5], visible=False) + p.wait_for_calculations() + + +def test_plot_3d_discontinuous(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(1/x, [x, -3, 3, 6], [y, -1, 1, 1], visible=False) + p.wait_for_calculations() + + +def test_plot_2d_polar(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(1/x, [x, -1, 1, 4], 'mode=polar', visible=False) + p.wait_for_calculations() + + +def test_plot_3d_cylinder(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot( + 1/y, [x, 0, 6.282, 4], [y, -1, 1, 4], 'mode=polar;style=solid', + visible=False) + p.wait_for_calculations() + + +def test_plot_3d_spherical(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot( + 1, [x, 0, 6.282, 4], [y, 0, 3.141, + 4], 'mode=spherical;style=wireframe', + visible=False) + p.wait_for_calculations() + + +def test_plot_2d_parametric(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(sin(x), cos(x), [x, 0, 6.282, 4], visible=False) + p.wait_for_calculations() + + +def test_plot_3d_parametric(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(sin(x), cos(x), x/5.0, [x, 0, 6.282, 4], visible=False) + p.wait_for_calculations() + + +def _test_plot_log(): + from sympy.plotting.pygletplot import PygletPlot + p = PygletPlot(log(x), [x, 0, 6.282, 4], 'mode=polar', visible=False) + p.wait_for_calculations() + + +def test_plot_integral(): + # Make sure it doesn't treat x as an independent variable + from sympy.plotting.pygletplot import PygletPlot + from sympy.integrals.integrals import Integral + p = PygletPlot(Integral(z*x, (x, 1, z), (z, 1, y)), visible=False) + p.wait_for_calculations() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/util.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/util.py new file mode 100644 index 0000000000000000000000000000000000000000..43b882ca18274dcdb273cf35680016453db3c698 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/pygletplot/util.py @@ -0,0 +1,188 @@ +try: + from ctypes import c_float, c_int, c_double +except ImportError: + pass + +import pyglet.gl as pgl +from sympy.core import S + + +def get_model_matrix(array_type=c_float, glGetMethod=pgl.glGetFloatv): + """ + Returns the current modelview matrix. + """ + m = (array_type*16)() + glGetMethod(pgl.GL_MODELVIEW_MATRIX, m) + return m + + +def get_projection_matrix(array_type=c_float, glGetMethod=pgl.glGetFloatv): + """ + Returns the current modelview matrix. + """ + m = (array_type*16)() + glGetMethod(pgl.GL_PROJECTION_MATRIX, m) + return m + + +def get_viewport(): + """ + Returns the current viewport. + """ + m = (c_int*4)() + pgl.glGetIntegerv(pgl.GL_VIEWPORT, m) + return m + + +def get_direction_vectors(): + m = get_model_matrix() + return ((m[0], m[4], m[8]), + (m[1], m[5], m[9]), + (m[2], m[6], m[10])) + + +def get_view_direction_vectors(): + m = get_model_matrix() + return ((m[0], m[1], m[2]), + (m[4], m[5], m[6]), + (m[8], m[9], m[10])) + + +def get_basis_vectors(): + return ((1, 0, 0), (0, 1, 0), (0, 0, 1)) + + +def screen_to_model(x, y, z): + m = get_model_matrix(c_double, pgl.glGetDoublev) + p = get_projection_matrix(c_double, pgl.glGetDoublev) + w = get_viewport() + mx, my, mz = c_double(), c_double(), c_double() + pgl.gluUnProject(x, y, z, m, p, w, mx, my, mz) + return float(mx.value), float(my.value), float(mz.value) + + +def model_to_screen(x, y, z): + m = get_model_matrix(c_double, pgl.glGetDoublev) + p = get_projection_matrix(c_double, pgl.glGetDoublev) + w = get_viewport() + mx, my, mz = c_double(), c_double(), c_double() + pgl.gluProject(x, y, z, m, p, w, mx, my, mz) + return float(mx.value), float(my.value), float(mz.value) + + +def vec_subs(a, b): + return tuple(a[i] - b[i] for i in range(len(a))) + + +def billboard_matrix(): + """ + Removes rotational components of + current matrix so that primitives + are always drawn facing the viewer. + + |1|0|0|x| + |0|1|0|x| + |0|0|1|x| (x means left unchanged) + |x|x|x|x| + """ + m = get_model_matrix() + # XXX: for i in range(11): m[i] = i ? + m[0] = 1 + m[1] = 0 + m[2] = 0 + m[4] = 0 + m[5] = 1 + m[6] = 0 + m[8] = 0 + m[9] = 0 + m[10] = 1 + pgl.glLoadMatrixf(m) + + +def create_bounds(): + return [[S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0], + [S.Infinity, S.NegativeInfinity, 0]] + + +def update_bounds(b, v): + if v is None: + return + for axis in range(3): + b[axis][0] = min([b[axis][0], v[axis]]) + b[axis][1] = max([b[axis][1], v[axis]]) + + +def interpolate(a_min, a_max, a_ratio): + return a_min + a_ratio * (a_max - a_min) + + +def rinterpolate(a_min, a_max, a_value): + a_range = a_max - a_min + if a_max == a_min: + a_range = 1.0 + return (a_value - a_min) / float(a_range) + + +def interpolate_color(color1, color2, ratio): + return tuple(interpolate(color1[i], color2[i], ratio) for i in range(3)) + + +def scale_value(v, v_min, v_len): + return (v - v_min) / v_len + + +def scale_value_list(flist): + v_min, v_max = min(flist), max(flist) + v_len = v_max - v_min + return [scale_value(f, v_min, v_len) for f in flist] + + +def strided_range(r_min, r_max, stride, max_steps=50): + o_min, o_max = r_min, r_max + if abs(r_min - r_max) < 0.001: + return [] + try: + range(int(r_min - r_max)) + except (TypeError, OverflowError): + return [] + if r_min > r_max: + raise ValueError("r_min cannot be greater than r_max") + r_min_s = (r_min % stride) + r_max_s = stride - (r_max % stride) + if abs(r_max_s - stride) < 0.001: + r_max_s = 0.0 + r_min -= r_min_s + r_max += r_max_s + r_steps = int((r_max - r_min)/stride) + if max_steps and r_steps > max_steps: + return strided_range(o_min, o_max, stride*2) + return [r_min] + [r_min + e*stride for e in range(1, r_steps + 1)] + [r_max] + + +def parse_option_string(s): + if not isinstance(s, str): + return None + options = {} + for token in s.split(';'): + pieces = token.split('=') + if len(pieces) == 1: + option, value = pieces[0], "" + elif len(pieces) == 2: + option, value = pieces + else: + raise ValueError("Plot option string '%s' is malformed." % (s)) + options[option.strip()] = value.strip() + return options + + +def dot_product(v1, v2): + return sum(v1[i]*v2[i] for i in range(3)) + + +def vec_sub(v1, v2): + return tuple(v1[i] - v2[i] for i in range(3)) + + +def vec_mag(v): + return sum(v[i]**2 for i in range(3))**(0.5) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/series.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/series.py new file mode 100644 index 0000000000000000000000000000000000000000..ddd64116277668389fb8defc8289543667d2c9e8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/series.py @@ -0,0 +1,2591 @@ +### The base class for all series +from collections.abc import Callable +from sympy.calculus.util import continuous_domain +from sympy.concrete import Sum, Product +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.function import arity +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Symbol +from sympy.functions import atan2, zeta, frac, ceiling, floor, im +from sympy.core.relational import (Equality, GreaterThan, + LessThan, Relational, Ne) +from sympy.core.sympify import sympify +from sympy.external import import_module +from sympy.logic.boolalg import BooleanFunction +from sympy.plotting.utils import _get_free_symbols, extract_solution +from sympy.printing.latex import latex +from sympy.printing.pycode import PythonCodePrinter +from sympy.printing.precedence import precedence +from sympy.sets.sets import Set, Interval, Union +from sympy.simplify.simplify import nsimplify +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.lambdify import lambdify +from .intervalmath import interval +import warnings + + +class IntervalMathPrinter(PythonCodePrinter): + """A printer to be used inside `plot_implicit` when `adaptive=True`, + in which case the interval arithmetic module is going to be used, which + requires the following edits. + """ + def _print_And(self, expr): + PREC = precedence(expr) + return " & ".join(self.parenthesize(a, PREC) + for a in sorted(expr.args, key=default_sort_key)) + + def _print_Or(self, expr): + PREC = precedence(expr) + return " | ".join(self.parenthesize(a, PREC) + for a in sorted(expr.args, key=default_sort_key)) + + +def _uniform_eval(f1, f2, *args, modules=None, + force_real_eval=False, has_sum=False): + """ + Note: this is an experimental function, as such it is prone to changes. + Please, do not use it in your code. + """ + np = import_module('numpy') + + def wrapper_func(func, *args): + try: + return complex(func(*args)) + except (ZeroDivisionError, OverflowError): + return complex(np.nan, np.nan) + + # NOTE: np.vectorize is much slower than numpy vectorized operations. + # However, this modules must be able to evaluate functions also with + # mpmath or sympy. + wrapper_func = np.vectorize(wrapper_func, otypes=[complex]) + + def _eval_with_sympy(err=None): + if f2 is None: + msg = "Impossible to evaluate the provided numerical function" + if err is None: + msg += "." + else: + msg += "because the following exception was raised:\n" + "{}: {}".format(type(err).__name__, err) + raise RuntimeError(msg) + if err: + warnings.warn( + "The evaluation with %s failed.\n" % ( + "NumPy/SciPy" if not modules else modules) + + "{}: {}\n".format(type(err).__name__, err) + + "Trying to evaluate the expression with Sympy, but it might " + "be a slow operation." + ) + return wrapper_func(f2, *args) + + if modules == "sympy": + return _eval_with_sympy() + + try: + return wrapper_func(f1, *args) + except Exception as err: + return _eval_with_sympy(err) + + +def _adaptive_eval(f, x): + """Evaluate f(x) with an adaptive algorithm. Post-process the result. + If a symbolic expression is evaluated with SymPy, it might returns + another symbolic expression, containing additions, ... + Force evaluation to a float. + + Parameters + ========== + f : callable + x : float + """ + np = import_module('numpy') + + y = f(x) + if isinstance(y, Expr) and (not y.is_Number): + y = y.evalf() + y = complex(y) + if y.imag > 1e-08: + return np.nan + return y.real + + +def _get_wrapper_for_expr(ret): + wrapper = "%s" + if ret == "real": + wrapper = "re(%s)" + elif ret == "imag": + wrapper = "im(%s)" + elif ret == "abs": + wrapper = "abs(%s)" + elif ret == "arg": + wrapper = "arg(%s)" + return wrapper + + +class BaseSeries: + """Base class for the data objects containing stuff to be plotted. + + Notes + ===== + + The backend should check if it supports the data series that is given. + (e.g. TextBackend supports only LineOver1DRangeSeries). + It is the backend responsibility to know how to use the class of + data series that is given. + + Some data series classes are grouped (using a class attribute like is_2Dline) + according to the api they present (based only on convention). The backend is + not obliged to use that api (e.g. LineOver1DRangeSeries belongs to the + is_2Dline group and presents the get_points method, but the + TextBackend does not use the get_points method). + + BaseSeries + """ + + # Some flags follow. The rationale for using flags instead of checking base + # classes is that setting multiple flags is simpler than multiple + # inheritance. + + is_2Dline = False + # Some of the backends expect: + # - get_points returning 1D np.arrays list_x, list_y + # - get_color_array returning 1D np.array (done in Line2DBaseSeries) + # with the colors calculated at the points from get_points + + is_3Dline = False + # Some of the backends expect: + # - get_points returning 1D np.arrays list_x, list_y, list_y + # - get_color_array returning 1D np.array (done in Line2DBaseSeries) + # with the colors calculated at the points from get_points + + is_3Dsurface = False + # Some of the backends expect: + # - get_meshes returning mesh_x, mesh_y, mesh_z (2D np.arrays) + # - get_points an alias for get_meshes + + is_contour = False + # Some of the backends expect: + # - get_meshes returning mesh_x, mesh_y, mesh_z (2D np.arrays) + # - get_points an alias for get_meshes + + is_implicit = False + # Some of the backends expect: + # - get_meshes returning mesh_x (1D array), mesh_y(1D array, + # mesh_z (2D np.arrays) + # - get_points an alias for get_meshes + # Different from is_contour as the colormap in backend will be + # different + + is_interactive = False + # An interactive series can update its data. + + is_parametric = False + # The calculation of aesthetics expects: + # - get_parameter_points returning one or two np.arrays (1D or 2D) + # used for calculation aesthetics + + is_generic = False + # Represent generic user-provided numerical data + + is_vector = False + is_2Dvector = False + is_3Dvector = False + # Represents a 2D or 3D vector data series + + _N = 100 + # default number of discretization points for uniform sampling. Each + # subclass can set its number. + + def __init__(self, *args, **kwargs): + kwargs = _set_discretization_points(kwargs.copy(), type(self)) + # discretize the domain using only integer numbers + self.only_integers = kwargs.get("only_integers", False) + # represents the evaluation modules to be used by lambdify + self.modules = kwargs.get("modules", None) + # plot functions might create data series that might not be useful to + # be shown on the legend, for example wireframe lines on 3D plots. + self.show_in_legend = kwargs.get("show_in_legend", True) + # line and surface series can show data with a colormap, hence a + # colorbar is essential to understand the data. However, sometime it + # is useful to hide it on series-by-series base. The following keyword + # controls whether the series should show a colorbar or not. + self.colorbar = kwargs.get("colorbar", True) + # Some series might use a colormap as default coloring. Setting this + # attribute to False will inform the backends to use solid color. + self.use_cm = kwargs.get("use_cm", False) + # If True, the backend will attempt to render it on a polar-projection + # axis, or using a polar discretization if a 3D plot is requested + self.is_polar = kwargs.get("is_polar", kwargs.get("polar", False)) + # If True, the rendering will use points, not lines. + self.is_point = kwargs.get("is_point", kwargs.get("point", False)) + # some backend is able to render latex, other needs standard text + self._label = self._latex_label = "" + + self._ranges = [] + self._n = [ + int(kwargs.get("n1", self._N)), + int(kwargs.get("n2", self._N)), + int(kwargs.get("n3", self._N)) + ] + self._scales = [ + kwargs.get("xscale", "linear"), + kwargs.get("yscale", "linear"), + kwargs.get("zscale", "linear") + ] + + # enable interactive widget plots + self._params = kwargs.get("params", {}) + if not isinstance(self._params, dict): + raise TypeError("`params` must be a dictionary mapping symbols " + "to numeric values.") + if len(self._params) > 0: + self.is_interactive = True + + # contains keyword arguments that will be passed to the rendering + # function of the chosen plotting library + self.rendering_kw = kwargs.get("rendering_kw", {}) + + # numerical transformation functions to be applied to the output data: + # x, y, z (coordinates), p (parameter on parametric plots) + self._tx = kwargs.get("tx", None) + self._ty = kwargs.get("ty", None) + self._tz = kwargs.get("tz", None) + self._tp = kwargs.get("tp", None) + if not all(callable(t) or (t is None) for t in + [self._tx, self._ty, self._tz, self._tp]): + raise TypeError("`tx`, `ty`, `tz`, `tp` must be functions.") + + # list of numerical functions representing the expressions to evaluate + self._functions = [] + # signature for the numerical functions + self._signature = [] + # some expressions don't like to be evaluated over complex data. + # if that's the case, set this to True + self._force_real_eval = kwargs.get("force_real_eval", None) + # this attribute will eventually contain a dictionary with the + # discretized ranges + self._discretized_domain = None + # whether the series contains any interactive range, which is a range + # where the minimum and maximum values can be changed with an + # interactive widget + self._interactive_ranges = False + # NOTE: consider a generic summation, for example: + # s = Sum(cos(pi * x), (x, 1, y)) + # This gets lambdified to something: + # sum(cos(pi*x) for x in range(1, y+1)) + # Hence, y needs to be an integer, otherwise it raises: + # TypeError: 'complex' object cannot be interpreted as an integer + # This list will contains symbols that are upper bound to summations + # or products + self._needs_to_be_int = [] + # a color function will be responsible to set the line/surface color + # according to some logic. Each data series will et an appropriate + # default value. + self.color_func = None + # NOTE: color_func usually receives numerical functions that are going + # to be evaluated over the coordinates of the computed points (or the + # discretized meshes). + # However, if an expression is given to color_func, then it will be + # lambdified with symbols in self._signature, and it will be evaluated + # with the same data used to evaluate the plotted expression. + self._eval_color_func_with_signature = False + + def _block_lambda_functions(self, *exprs): + """Some data series can be used to plot numerical functions, others + cannot. Execute this method inside the `__init__` to prevent the + processing of numerical functions. + """ + if any(callable(e) for e in exprs): + raise TypeError(type(self).__name__ + " requires a symbolic " + "expression.") + + def _check_fs(self): + """ Checks if there are enough parameters and free symbols. + """ + exprs, ranges = self.expr, self.ranges + params, label = self.params, self.label + exprs = exprs if hasattr(exprs, "__iter__") else [exprs] + if any(callable(e) for e in exprs): + return + + # from the expression's free symbols, remove the ones used in + # the parameters and the ranges + fs = _get_free_symbols(exprs) + fs = fs.difference(params.keys()) + if ranges is not None: + fs = fs.difference([r[0] for r in ranges]) + + if len(fs) > 0: + raise ValueError( + "Incompatible expression and parameters.\n" + + "Expression: {}\n".format( + (exprs, ranges, label) if ranges is not None else (exprs, label)) + + "params: {}\n".format(params) + + "Specify what these symbols represent: {}\n".format(fs) + + "Are they ranges or parameters?" + ) + + # verify that all symbols are known (they either represent plotting + # ranges or parameters) + range_symbols = [r[0] for r in ranges] + for r in ranges: + fs = set().union(*[e.free_symbols for e in r[1:]]) + if any(t in fs for t in range_symbols): + # ranges can't depend on each other, for example this are + # not allowed: + # (x, 0, y), (y, 0, 3) + # (x, 0, y), (y, x + 2, 3) + raise ValueError("Range symbols can't be included into " + "minimum and maximum of a range. " + "Received range: %s" % str(r)) + if len(fs) > 0: + self._interactive_ranges = True + remaining_fs = fs.difference(params.keys()) + if len(remaining_fs) > 0: + raise ValueError( + "Unknown symbols found in plotting range: %s. " % (r,) + + "Are the following parameters? %s" % remaining_fs) + + def _create_lambda_func(self): + """Create the lambda functions to be used by the uniform meshing + strategy. + + Notes + ===== + The old sympy.plotting used experimental_lambdify. It created one + lambda function each time an evaluation was requested. If that failed, + it went on to create a different lambda function and evaluated it, + and so on. + + This new module changes strategy: it creates right away the default + lambda function as well as the backup one. The reason is that the + series could be interactive, hence the numerical function will be + evaluated multiple times. So, let's create the functions just once. + + This approach works fine for the majority of cases, in which the + symbolic expression is relatively short, hence the lambdification + is fast. If the expression is very long, this approach takes twice + the time to create the lambda functions. Be aware of that! + """ + exprs = self.expr if hasattr(self.expr, "__iter__") else [self.expr] + if not any(callable(e) for e in exprs): + fs = _get_free_symbols(exprs) + self._signature = sorted(fs, key=lambda t: t.name) + + # Generate a list of lambda functions, two for each expression: + # 1. the default one. + # 2. the backup one, in case of failures with the default one. + self._functions = [] + for e in exprs: + # TODO: set cse=True once this issue is solved: + # https://github.com/sympy/sympy/issues/24246 + self._functions.append([ + lambdify(self._signature, e, modules=self.modules), + lambdify(self._signature, e, modules="sympy", dummify=True), + ]) + else: + self._signature = sorted([r[0] for r in self.ranges], key=lambda t: t.name) + self._functions = [(e, None) for e in exprs] + + # deal with symbolic color_func + if isinstance(self.color_func, Expr): + self.color_func = lambdify(self._signature, self.color_func) + self._eval_color_func_with_signature = True + + def _update_range_value(self, t): + """If the value of a plotting range is a symbolic expression, + substitute the parameters in order to get a numerical value. + """ + if not self._interactive_ranges: + return complex(t) + return complex(t.subs(self.params)) + + def _create_discretized_domain(self): + """Discretize the ranges for uniform meshing strategy. + """ + # NOTE: the goal is to create a dictionary stored in + # self._discretized_domain, mapping symbols to a numpy array + # representing the discretization + discr_symbols = [] + discretizations = [] + + # create a 1D discretization + for i, r in enumerate(self.ranges): + discr_symbols.append(r[0]) + c_start = self._update_range_value(r[1]) + c_end = self._update_range_value(r[2]) + start = c_start.real if c_start.imag == c_end.imag == 0 else c_start + end = c_end.real if c_start.imag == c_end.imag == 0 else c_end + needs_integer_discr = self.only_integers or (r[0] in self._needs_to_be_int) + d = BaseSeries._discretize(start, end, self.n[i], + scale=self.scales[i], + only_integers=needs_integer_discr) + + if ((not self._force_real_eval) and (not needs_integer_discr) and + (d.dtype != "complex")): + d = d + 1j * c_start.imag + + if needs_integer_discr: + d = d.astype(int) + + discretizations.append(d) + + # create 2D or 3D + self._create_discretized_domain_helper(discr_symbols, discretizations) + + def _create_discretized_domain_helper(self, discr_symbols, discretizations): + """Create 2D or 3D discretized grids. + + Subclasses should override this method in order to implement a + different behaviour. + """ + np = import_module('numpy') + + # discretization suitable for 2D line plots, 3D surface plots, + # contours plots, vector plots + # NOTE: why indexing='ij'? Because it produces consistent results with + # np.mgrid. This is important as Mayavi requires this indexing + # to correctly compute 3D streamlines. While VTK is able to compute + # streamlines regardless of the indexing, with indexing='xy' it + # produces "strange" results with "voids" into the + # discretization volume. indexing='ij' solves the problem. + # Also note that matplotlib 2D streamlines requires indexing='xy'. + indexing = "xy" + if self.is_3Dvector or (self.is_3Dsurface and self.is_implicit): + indexing = "ij" + meshes = np.meshgrid(*discretizations, indexing=indexing) + self._discretized_domain = dict(zip(discr_symbols, meshes)) + + def _evaluate(self, cast_to_real=True): + """Evaluation of the symbolic expression (or expressions) with the + uniform meshing strategy, based on current values of the parameters. + """ + np = import_module('numpy') + + # create lambda functions + if not self._functions: + self._create_lambda_func() + # create (or update) the discretized domain + if (not self._discretized_domain) or self._interactive_ranges: + self._create_discretized_domain() + # ensure that discretized domains are returned with the proper order + discr = [self._discretized_domain[s[0]] for s in self.ranges] + + args = self._aggregate_args() + + results = [] + for f in self._functions: + r = _uniform_eval(*f, *args) + # the evaluation might produce an int/float. Need this correction. + r = self._correct_shape(np.array(r), discr[0]) + # sometime the evaluation is performed over arrays of type object. + # hence, `result` might be of type object, which don't work well + # with numpy real and imag functions. + r = r.astype(complex) + results.append(r) + + if cast_to_real: + discr = [np.real(d.astype(complex)) for d in discr] + return [*discr, *results] + + def _aggregate_args(self): + """Create a list of arguments to be passed to the lambda function, + sorted according to self._signature. + """ + args = [] + for s in self._signature: + if s in self._params.keys(): + args.append( + int(self._params[s]) if s in self._needs_to_be_int else + self._params[s] if self._force_real_eval + else complex(self._params[s])) + else: + args.append(self._discretized_domain[s]) + return args + + @property + def expr(self): + """Return the expression (or expressions) of the series.""" + return self._expr + + @expr.setter + def expr(self, e): + """Set the expression (or expressions) of the series.""" + is_iter = hasattr(e, "__iter__") + is_callable = callable(e) if not is_iter else any(callable(t) for t in e) + if is_callable: + self._expr = e + else: + self._expr = sympify(e) if not is_iter else Tuple(*e) + + # look for the upper bound of summations and products + s = set() + for e in self._expr.atoms(Sum, Product): + for a in e.args[1:]: + if isinstance(a[-1], Symbol): + s.add(a[-1]) + self._needs_to_be_int = list(s) + + # list of sympy functions that when lambdified, the corresponding + # numpy functions don't like complex-type arguments + pf = [ceiling, floor, atan2, frac, zeta] + if self._force_real_eval is not True: + check_res = [self._expr.has(f) for f in pf] + self._force_real_eval = any(check_res) + if self._force_real_eval and ((self.modules is None) or + (isinstance(self.modules, str) and "numpy" in self.modules)): + funcs = [f for f, c in zip(pf, check_res) if c] + warnings.warn("NumPy is unable to evaluate with complex " + "numbers some of the functions included in this " + "symbolic expression: %s. " % funcs + + "Hence, the evaluation will use real numbers. " + "If you believe the resulting plot is incorrect, " + "change the evaluation module by setting the " + "`modules` keyword argument.") + if self._functions: + # update lambda functions + self._create_lambda_func() + + @property + def is_3D(self): + flags3D = [self.is_3Dline, self.is_3Dsurface, self.is_3Dvector] + return any(flags3D) + + @property + def is_line(self): + flagslines = [self.is_2Dline, self.is_3Dline] + return any(flagslines) + + def _line_surface_color(self, prop, val): + """This method enables back-compatibility with old sympy.plotting""" + # NOTE: color_func is set inside the init method of the series. + # If line_color/surface_color is not a callable, then color_func will + # be set to None. + setattr(self, prop, val) + if callable(val) or isinstance(val, Expr): + self.color_func = val + setattr(self, prop, None) + elif val is not None: + self.color_func = None + + @property + def line_color(self): + return self._line_color + + @line_color.setter + def line_color(self, val): + self._line_surface_color("_line_color", val) + + @property + def n(self): + """Returns a list [n1, n2, n3] of numbers of discratization points. + """ + return self._n + + @n.setter + def n(self, v): + """Set the numbers of discretization points. ``v`` must be an int or + a list. + + Let ``s`` be a series. Then: + + * to set the number of discretization points along the x direction (or + first parameter): ``s.n = 10`` + * to set the number of discretization points along the x and y + directions (or first and second parameters): ``s.n = [10, 15]`` + * to set the number of discretization points along the x, y and z + directions: ``s.n = [10, 15, 20]`` + + The following is highly unreccomended, because it prevents + the execution of necessary code in order to keep updated data: + ``s.n[1] = 15`` + """ + if not hasattr(v, "__iter__"): + self._n[0] = v + else: + self._n[:len(v)] = v + if self._discretized_domain: + # update the discretized domain + self._create_discretized_domain() + + @property + def params(self): + """Get or set the current parameters dictionary. + + Parameters + ========== + + p : dict + + * key: symbol associated to the parameter + * val: the numeric value + """ + return self._params + + @params.setter + def params(self, p): + self._params = p + + def _post_init(self): + exprs = self.expr if hasattr(self.expr, "__iter__") else [self.expr] + if any(callable(e) for e in exprs) and self.params: + raise TypeError("`params` was provided, hence an interactive plot " + "is expected. However, interactive plots do not support " + "user-provided numerical functions.") + + # if the expressions is a lambda function and no label has been + # provided, then its better to do the following in order to avoid + # surprises on the backend + if any(callable(e) for e in exprs): + if self._label == str(self.expr): + self.label = "" + + self._check_fs() + + if hasattr(self, "adaptive") and self.adaptive and self.params: + warnings.warn("`params` was provided, hence an interactive plot " + "is expected. However, interactive plots do not support " + "adaptive evaluation. Automatically switched to " + "adaptive=False.") + self.adaptive = False + + @property + def scales(self): + return self._scales + + @scales.setter + def scales(self, v): + if isinstance(v, str): + self._scales[0] = v + else: + self._scales[:len(v)] = v + + @property + def surface_color(self): + return self._surface_color + + @surface_color.setter + def surface_color(self, val): + self._line_surface_color("_surface_color", val) + + @property + def rendering_kw(self): + return self._rendering_kw + + @rendering_kw.setter + def rendering_kw(self, kwargs): + if isinstance(kwargs, dict): + self._rendering_kw = kwargs + else: + self._rendering_kw = {} + if kwargs is not None: + warnings.warn( + "`rendering_kw` must be a dictionary, instead an " + "object of type %s was received. " % type(kwargs) + + "Automatically setting `rendering_kw` to an empty " + "dictionary") + + @staticmethod + def _discretize(start, end, N, scale="linear", only_integers=False): + """Discretize a 1D domain. + + Returns + ======= + + domain : np.ndarray with dtype=float or complex + The domain's dtype will be float or complex (depending on the + type of start/end) even if only_integers=True. It is left for + the downstream code to perform further casting, if necessary. + """ + np = import_module('numpy') + + if only_integers is True: + start, end = int(start), int(end) + N = end - start + 1 + + if scale == "linear": + return np.linspace(start, end, N) + return np.geomspace(start, end, N) + + @staticmethod + def _correct_shape(a, b): + """Convert ``a`` to a np.ndarray of the same shape of ``b``. + + Parameters + ========== + + a : int, float, complex, np.ndarray + Usually, this is the result of a numerical evaluation of a + symbolic expression. Even if a discretized domain was used to + evaluate the function, the result can be a scalar (int, float, + complex). Think for example to ``expr = Float(2)`` and + ``f = lambdify(x, expr)``. No matter the shape of the numerical + array representing x, the result of the evaluation will be + a single value. + + b : np.ndarray + It represents the correct shape that ``a`` should have. + + Returns + ======= + new_a : np.ndarray + An array with the correct shape. + """ + np = import_module('numpy') + + if not isinstance(a, np.ndarray): + a = np.array(a) + if a.shape != b.shape: + if a.shape == (): + a = a * np.ones_like(b) + else: + a = a.reshape(b.shape) + return a + + def eval_color_func(self, *args): + """Evaluate the color function. + + Parameters + ========== + + args : tuple + Arguments to be passed to the coloring function. Can be coordinates + or parameters or both. + + Notes + ===== + + The backend will request the data series to generate the numerical + data. Depending on the data series, either the data series itself or + the backend will eventually execute this function to generate the + appropriate coloring value. + """ + np = import_module('numpy') + if self.color_func is None: + # NOTE: with the line_color and surface_color attributes + # (back-compatibility with the old sympy.plotting module) it is + # possible to create a plot with a callable line_color (or + # surface_color). For example: + # p = plot(sin(x), line_color=lambda x, y: -y) + # This creates a ColoredLineOver1DRangeSeries with line_color=None + # and color_func=lambda x, y: -y, which effectively is a + # parametric series. Later we could change it to a string value: + # p[0].line_color = "red" + # However, this sets ine_color="red" and color_func=None, but the + # series is still ColoredLineOver1DRangeSeries (a parametric + # series), which will render using a color_func... + warnings.warn("This is likely not the result you were " + "looking for. Please, re-execute the plot command, this time " + "with the appropriate an appropriate value to line_color " + "or surface_color.") + return np.ones_like(args[0]) + + if self._eval_color_func_with_signature: + args = self._aggregate_args() + color = self.color_func(*args) + _re, _im = np.real(color), np.imag(color) + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + return _re + + nargs = arity(self.color_func) + if nargs == 1: + if self.is_2Dline and self.is_parametric: + if len(args) == 2: + # ColoredLineOver1DRangeSeries + return self._correct_shape(self.color_func(args[0]), args[0]) + # Parametric2DLineSeries + return self._correct_shape(self.color_func(args[2]), args[2]) + elif self.is_3Dline and self.is_parametric: + return self._correct_shape(self.color_func(args[3]), args[3]) + elif self.is_3Dsurface and self.is_parametric: + return self._correct_shape(self.color_func(args[3]), args[3]) + return self._correct_shape(self.color_func(args[0]), args[0]) + elif nargs == 2: + if self.is_3Dsurface and self.is_parametric: + return self._correct_shape(self.color_func(*args[3:]), args[3]) + return self._correct_shape(self.color_func(*args[:2]), args[0]) + return self._correct_shape(self.color_func(*args[:nargs]), args[0]) + + def get_data(self): + """Compute and returns the numerical data. + + The number of parameters returned by this method depends on the + specific instance. If ``s`` is the series, make sure to read + ``help(s.get_data)`` to understand what it returns. + """ + raise NotImplementedError + + def _get_wrapped_label(self, label, wrapper): + """Given a latex representation of an expression, wrap it inside + some characters. Matplotlib needs "$%s%$", K3D-Jupyter needs "%s". + """ + return wrapper % label + + def get_label(self, use_latex=False, wrapper="$%s$"): + """Return the label to be used to display the expression. + + Parameters + ========== + use_latex : bool + If False, the string representation of the expression is returned. + If True, the latex representation is returned. + wrapper : str + The backend might need the latex representation to be wrapped by + some characters. Default to ``"$%s$"``. + + Returns + ======= + label : str + """ + if use_latex is False: + return self._label + if self._label == str(self.expr): + # when the backend requests a latex label and user didn't provide + # any label + return self._get_wrapped_label(self._latex_label, wrapper) + return self._latex_label + + @property + def label(self): + return self.get_label() + + @label.setter + def label(self, val): + """Set the labels associated to this series.""" + # NOTE: the init method of any series requires a label. If the user do + # not provide it, the preprocessing function will set label=None, which + # informs the series to initialize two attributes: + # _label contains the string representation of the expression. + # _latex_label contains the latex representation of the expression. + self._label = self._latex_label = val + + @property + def ranges(self): + return self._ranges + + @ranges.setter + def ranges(self, val): + new_vals = [] + for v in val: + if v is not None: + new_vals.append(tuple([sympify(t) for t in v])) + self._ranges = new_vals + + def _apply_transform(self, *args): + """Apply transformations to the results of numerical evaluation. + + Parameters + ========== + args : tuple + Results of numerical evaluation. + + Returns + ======= + transformed_args : tuple + Tuple containing the transformed results. + """ + t = lambda x, transform: x if transform is None else transform(x) + x, y, z = None, None, None + if len(args) == 2: + x, y = args + return t(x, self._tx), t(y, self._ty) + elif (len(args) == 3) and isinstance(self, Parametric2DLineSeries): + x, y, u = args + return (t(x, self._tx), t(y, self._ty), t(u, self._tp)) + elif len(args) == 3: + x, y, z = args + return t(x, self._tx), t(y, self._ty), t(z, self._tz) + elif (len(args) == 4) and isinstance(self, Parametric3DLineSeries): + x, y, z, u = args + return (t(x, self._tx), t(y, self._ty), t(z, self._tz), t(u, self._tp)) + elif len(args) == 4: # 2D vector plot + x, y, u, v = args + return ( + t(x, self._tx), t(y, self._ty), + t(u, self._tx), t(v, self._ty) + ) + elif (len(args) == 5) and isinstance(self, ParametricSurfaceSeries): + x, y, z, u, v = args + return (t(x, self._tx), t(y, self._ty), t(z, self._tz), u, v) + elif (len(args) == 6) and self.is_3Dvector: # 3D vector plot + x, y, z, u, v, w = args + return ( + t(x, self._tx), t(y, self._ty), t(z, self._tz), + t(u, self._tx), t(v, self._ty), t(w, self._tz) + ) + elif len(args) == 6: # complex plot + x, y, _abs, _arg, img, colors = args + return ( + x, y, t(_abs, self._tz), _arg, img, colors) + return args + + def _str_helper(self, s): + pre, post = "", "" + if self.is_interactive: + pre = "interactive " + post = " and parameters " + str(tuple(self.params.keys())) + return pre + s + post + + +def _detect_poles_numerical_helper(x, y, eps=0.01, expr=None, symb=None, symbolic=False): + """Compute the steepness of each segment. If it's greater than a + threshold, set the right-point y-value non NaN and record the + corresponding x-location for further processing. + + Returns + ======= + x : np.ndarray + Unchanged x-data. + yy : np.ndarray + Modified y-data with NaN values. + """ + np = import_module('numpy') + + yy = y.copy() + threshold = np.pi / 2 - eps + for i in range(len(x) - 1): + dx = x[i + 1] - x[i] + dy = abs(y[i + 1] - y[i]) + angle = np.arctan(dy / dx) + if abs(angle) >= threshold: + yy[i + 1] = np.nan + + return x, yy + +def _detect_poles_symbolic_helper(expr, symb, start, end): + """Attempts to compute symbolic discontinuities. + + Returns + ======= + pole : list + List of symbolic poles, possibly empty. + """ + poles = [] + interval = Interval(nsimplify(start), nsimplify(end)) + res = continuous_domain(expr, symb, interval) + res = res.simplify() + if res == interval: + pass + elif (isinstance(res, Union) and + all(isinstance(t, Interval) for t in res.args)): + poles = [] + for s in res.args: + if s.left_open: + poles.append(s.left) + if s.right_open: + poles.append(s.right) + poles = list(set(poles)) + else: + raise ValueError( + f"Could not parse the following object: {res} .\n" + "Please, submit this as a bug. Consider also to set " + "`detect_poles=True`." + ) + return poles + + +### 2D lines +class Line2DBaseSeries(BaseSeries): + """A base class for 2D lines. + + - adding the label, steps and only_integers options + - making is_2Dline true + - defining get_segments and get_color_array + """ + + is_2Dline = True + _dim = 2 + _N = 1000 + + def __init__(self, **kwargs): + super().__init__(**kwargs) + self.steps = kwargs.get("steps", False) + self.is_point = kwargs.get("is_point", kwargs.get("point", False)) + self.is_filled = kwargs.get("is_filled", kwargs.get("fill", True)) + self.adaptive = kwargs.get("adaptive", False) + self.depth = kwargs.get('depth', 12) + self.use_cm = kwargs.get("use_cm", False) + self.color_func = kwargs.get("color_func", None) + self.line_color = kwargs.get("line_color", None) + self.detect_poles = kwargs.get("detect_poles", False) + self.eps = kwargs.get("eps", 0.01) + self.is_polar = kwargs.get("is_polar", kwargs.get("polar", False)) + self.unwrap = kwargs.get("unwrap", False) + # when detect_poles="symbolic", stores the location of poles so that + # they can be appropriately rendered + self.poles_locations = [] + exclude = kwargs.get("exclude", []) + if isinstance(exclude, Set): + exclude = list(extract_solution(exclude, n=100)) + if not hasattr(exclude, "__iter__"): + exclude = [exclude] + exclude = [float(e) for e in exclude] + self.exclude = sorted(exclude) + + def get_data(self): + """Return coordinates for plotting the line. + + Returns + ======= + + x: np.ndarray + x-coordinates + + y: np.ndarray + y-coordinates + + z: np.ndarray (optional) + z-coordinates in case of Parametric3DLineSeries, + Parametric3DLineInteractiveSeries + + param : np.ndarray (optional) + The parameter in case of Parametric2DLineSeries, + Parametric3DLineSeries or AbsArgLineSeries (and their + corresponding interactive series). + """ + np = import_module('numpy') + points = self._get_data_helper() + + if (isinstance(self, LineOver1DRangeSeries) and + (self.detect_poles == "symbolic")): + poles = _detect_poles_symbolic_helper( + self.expr.subs(self.params), *self.ranges[0]) + poles = np.array([float(t) for t in poles]) + t = lambda x, transform: x if transform is None else transform(x) + self.poles_locations = t(np.array(poles), self._tx) + + # postprocessing + points = self._apply_transform(*points) + + if self.is_2Dline and self.detect_poles: + if len(points) == 2: + x, y = points + x, y = _detect_poles_numerical_helper( + x, y, self.eps) + points = (x, y) + else: + x, y, p = points + x, y = _detect_poles_numerical_helper(x, y, self.eps) + points = (x, y, p) + + if self.unwrap: + kw = {} + if self.unwrap is not True: + kw = self.unwrap + if self.is_2Dline: + if len(points) == 2: + x, y = points + y = np.unwrap(y, **kw) + points = (x, y) + else: + x, y, p = points + y = np.unwrap(y, **kw) + points = (x, y, p) + + if self.steps is True: + if self.is_2Dline: + x, y = points[0], points[1] + x = np.array((x, x)).T.flatten()[1:] + y = np.array((y, y)).T.flatten()[:-1] + if self.is_parametric: + points = (x, y, points[2]) + else: + points = (x, y) + elif self.is_3Dline: + x = np.repeat(points[0], 3)[2:] + y = np.repeat(points[1], 3)[:-2] + z = np.repeat(points[2], 3)[1:-1] + if len(points) > 3: + points = (x, y, z, points[3]) + else: + points = (x, y, z) + + if len(self.exclude) > 0: + points = self._insert_exclusions(points) + return points + + def get_segments(self): + sympy_deprecation_warning( + """ + The Line2DBaseSeries.get_segments() method is deprecated. + + Instead, use the MatplotlibBackend.get_segments() method, or use + The get_points() or get_data() methods. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-get-segments") + + np = import_module('numpy') + points = type(self).get_data(self) + points = np.ma.array(points).T.reshape(-1, 1, self._dim) + return np.ma.concatenate([points[:-1], points[1:]], axis=1) + + def _insert_exclusions(self, points): + """Add NaN to each of the exclusion point. Practically, this adds a + NaN to the exclusion point, plus two other nearby points evaluated with + the numerical functions associated to this data series. + These nearby points are important when the number of discretization + points is low, or the scale is logarithm. + + NOTE: it would be easier to just add exclusion points to the + discretized domain before evaluation, then after evaluation add NaN + to the exclusion points. But that's only work with adaptive=False. + The following approach work even with adaptive=True. + """ + np = import_module("numpy") + points = list(points) + n = len(points) + # index of the x-coordinate (for 2d plots) or parameter (for 2d/3d + # parametric plots) + k = n - 1 + if n == 2: + k = 0 + # indices of the other coordinates + j_indeces = sorted(set(range(n)).difference([k])) + # TODO: for now, I assume that numpy functions are going to succeed + funcs = [f[0] for f in self._functions] + + for e in self.exclude: + res = points[k] - e >= 0 + # if res contains both True and False, ie, if e is found + if any(res) and any(~res): + idx = np.nanargmax(res) + # select the previous point with respect to e + idx -= 1 + # TODO: what if points[k][idx]==e or points[k][idx+1]==e? + + if idx > 0 and idx < len(points[k]) - 1: + delta_prev = abs(e - points[k][idx]) + delta_post = abs(e - points[k][idx + 1]) + delta = min(delta_prev, delta_post) / 100 + prev = e - delta + post = e + delta + + # add points to the x-coord or the parameter + points[k] = np.concatenate( + (points[k][:idx], [prev, e, post], points[k][idx+1:])) + + # add points to the other coordinates + c = 0 + for j in j_indeces: + values = funcs[c](np.array([prev, post])) + c += 1 + points[j] = np.concatenate( + (points[j][:idx], [values[0], np.nan, values[1]], points[j][idx+1:])) + return points + + @property + def var(self): + return None if not self.ranges else self.ranges[0][0] + + @property + def start(self): + if not self.ranges: + return None + try: + return self._cast(self.ranges[0][1]) + except TypeError: + return self.ranges[0][1] + + @property + def end(self): + if not self.ranges: + return None + try: + return self._cast(self.ranges[0][2]) + except TypeError: + return self.ranges[0][2] + + @property + def xscale(self): + return self._scales[0] + + @xscale.setter + def xscale(self, v): + self.scales = v + + def get_color_array(self): + np = import_module('numpy') + c = self.line_color + if hasattr(c, '__call__'): + f = np.vectorize(c) + nargs = arity(c) + if nargs == 1 and self.is_parametric: + x = self.get_parameter_points() + return f(centers_of_segments(x)) + else: + variables = list(map(centers_of_segments, self.get_points())) + if nargs == 1: + return f(variables[0]) + elif nargs == 2: + return f(*variables[:2]) + else: # only if the line is 3D (otherwise raises an error) + return f(*variables) + else: + return c*np.ones(self.nb_of_points) + + +class List2DSeries(Line2DBaseSeries): + """Representation for a line consisting of list of points.""" + + def __init__(self, list_x, list_y, label="", **kwargs): + super().__init__(**kwargs) + np = import_module('numpy') + if len(list_x) != len(list_y): + raise ValueError( + "The two lists of coordinates must have the same " + "number of elements.\n" + "Received: len(list_x) = {} ".format(len(list_x)) + + "and len(list_y) = {}".format(len(list_y)) + ) + self._block_lambda_functions(list_x, list_y) + check = lambda l: [isinstance(t, Expr) and (not t.is_number) for t in l] + if any(check(list_x) + check(list_y)) or self.params: + if not self.params: + raise ValueError("Some or all elements of the provided lists " + "are symbolic expressions, but the ``params`` dictionary " + "was not provided: those elements can't be evaluated.") + self.list_x = Tuple(*list_x) + self.list_y = Tuple(*list_y) + else: + self.list_x = np.array(list_x, dtype=np.float64) + self.list_y = np.array(list_y, dtype=np.float64) + + self._expr = (self.list_x, self.list_y) + if not any(isinstance(t, np.ndarray) for t in [self.list_x, self.list_y]): + self._check_fs() + self.is_polar = kwargs.get("is_polar", kwargs.get("polar", False)) + self.label = label + self.rendering_kw = kwargs.get("rendering_kw", {}) + if self.use_cm and self.color_func: + self.is_parametric = True + if isinstance(self.color_func, Expr): + raise TypeError( + "%s don't support symbolic " % self.__class__.__name__ + + "expression for `color_func`.") + + def __str__(self): + return "2D list plot" + + def _get_data_helper(self): + """Returns coordinates that needs to be postprocessed.""" + lx, ly = self.list_x, self.list_y + + if not self.is_interactive: + return self._eval_color_func_and_return(lx, ly) + + np = import_module('numpy') + lx = np.array([t.evalf(subs=self.params) for t in lx], dtype=float) + ly = np.array([t.evalf(subs=self.params) for t in ly], dtype=float) + return self._eval_color_func_and_return(lx, ly) + + def _eval_color_func_and_return(self, *data): + if self.use_cm and callable(self.color_func): + return [*data, self.eval_color_func(*data)] + return data + + +class LineOver1DRangeSeries(Line2DBaseSeries): + """Representation for a line consisting of a SymPy expression over a range.""" + + def __init__(self, expr, var_start_end, label="", **kwargs): + super().__init__(**kwargs) + self.expr = expr if callable(expr) else sympify(expr) + self._label = str(self.expr) if label is None else label + self._latex_label = latex(self.expr) if label is None else label + self.ranges = [var_start_end] + self._cast = complex + # for complex-related data series, this determines what data to return + # on the y-axis + self._return = kwargs.get("return", None) + self._post_init() + + if not self._interactive_ranges: + # NOTE: the following check is only possible when the minimum and + # maximum values of a plotting range are numeric + start, end = [complex(t) for t in self.ranges[0][1:]] + if im(start) != im(end): + raise ValueError( + "%s requires the imaginary " % self.__class__.__name__ + + "part of the start and end values of the range " + "to be the same.") + + if self.adaptive and self._return: + warnings.warn("The adaptive algorithm is unable to deal with " + "complex numbers. Automatically switching to uniform meshing.") + self.adaptive = False + + @property + def nb_of_points(self): + return self.n[0] + + @nb_of_points.setter + def nb_of_points(self, v): + self.n = v + + def __str__(self): + def f(t): + if isinstance(t, complex): + if t.imag != 0: + return t + return t.real + return t + pre = "interactive " if self.is_interactive else "" + post = "" + if self.is_interactive: + post = " and parameters " + str(tuple(self.params.keys())) + wrapper = _get_wrapper_for_expr(self._return) + return pre + "cartesian line: %s for %s over %s" % ( + wrapper % self.expr, + str(self.var), + str((f(self.start), f(self.end))), + ) + post + + def get_points(self): + """Return lists of coordinates for plotting. Depending on the + ``adaptive`` option, this function will either use an adaptive algorithm + or it will uniformly sample the expression over the provided range. + + This function is available for back-compatibility purposes. Consider + using ``get_data()`` instead. + + Returns + ======= + x : list + List of x-coordinates + + y : list + List of y-coordinates + """ + return self._get_data_helper() + + def _adaptive_sampling(self): + try: + if callable(self.expr): + f = self.expr + else: + f = lambdify([self.var], self.expr, self.modules) + x, y = self._adaptive_sampling_helper(f) + except Exception as err: + warnings.warn( + "The evaluation with %s failed.\n" % ( + "NumPy/SciPy" if not self.modules else self.modules) + + "{}: {}\n".format(type(err).__name__, err) + + "Trying to evaluate the expression with Sympy, but it might " + "be a slow operation." + ) + f = lambdify([self.var], self.expr, "sympy") + x, y = self._adaptive_sampling_helper(f) + return x, y + + def _adaptive_sampling_helper(self, f): + """The adaptive sampling is done by recursively checking if three + points are almost collinear. If they are not collinear, then more + points are added between those points. + + References + ========== + + .. [1] Adaptive polygonal approximation of parametric curves, + Luiz Henrique de Figueiredo. + """ + np = import_module('numpy') + + x_coords = [] + y_coords = [] + def sample(p, q, depth): + """ Samples recursively if three points are almost collinear. + For depth < 6, points are added irrespective of whether they + satisfy the collinearity condition or not. The maximum depth + allowed is 12. + """ + # Randomly sample to avoid aliasing. + random = 0.45 + np.random.rand() * 0.1 + if self.xscale == 'log': + xnew = 10**(np.log10(p[0]) + random * (np.log10(q[0]) - + np.log10(p[0]))) + else: + xnew = p[0] + random * (q[0] - p[0]) + ynew = _adaptive_eval(f, xnew) + new_point = np.array([xnew, ynew]) + + # Maximum depth + if depth > self.depth: + x_coords.append(q[0]) + y_coords.append(q[1]) + + # Sample to depth of 6 (whether the line is flat or not) + # without using linspace (to avoid aliasing). + elif depth < 6: + sample(p, new_point, depth + 1) + sample(new_point, q, depth + 1) + + # Sample ten points if complex values are encountered + # at both ends. If there is a real value in between, then + # sample those points further. + elif p[1] is None and q[1] is None: + if self.xscale == 'log': + xarray = np.logspace(p[0], q[0], 10) + else: + xarray = np.linspace(p[0], q[0], 10) + yarray = list(map(f, xarray)) + if not all(y is None for y in yarray): + for i in range(len(yarray) - 1): + if not (yarray[i] is None and yarray[i + 1] is None): + sample([xarray[i], yarray[i]], + [xarray[i + 1], yarray[i + 1]], depth + 1) + + # Sample further if one of the end points in None (i.e. a + # complex value) or the three points are not almost collinear. + elif (p[1] is None or q[1] is None or new_point[1] is None + or not flat(p, new_point, q)): + sample(p, new_point, depth + 1) + sample(new_point, q, depth + 1) + else: + x_coords.append(q[0]) + y_coords.append(q[1]) + + f_start = _adaptive_eval(f, self.start.real) + f_end = _adaptive_eval(f, self.end.real) + x_coords.append(self.start.real) + y_coords.append(f_start) + sample(np.array([self.start.real, f_start]), + np.array([self.end.real, f_end]), 0) + + return (x_coords, y_coords) + + def _uniform_sampling(self): + np = import_module('numpy') + + x, result = self._evaluate() + _re, _im = np.real(result), np.imag(result) + _re = self._correct_shape(_re, x) + _im = self._correct_shape(_im, x) + return x, _re, _im + + def _get_data_helper(self): + """Returns coordinates that needs to be postprocessed. + """ + np = import_module('numpy') + if self.adaptive and (not self.only_integers): + x, y = self._adaptive_sampling() + return [np.array(t) for t in [x, y]] + + x, _re, _im = self._uniform_sampling() + + if self._return is None: + # The evaluation could produce complex numbers. Set real elements + # to NaN where there are non-zero imaginary elements + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + elif self._return == "real": + pass + elif self._return == "imag": + _re = _im + elif self._return == "abs": + _re = np.sqrt(_re**2 + _im**2) + elif self._return == "arg": + _re = np.arctan2(_im, _re) + else: + raise ValueError("`_return` not recognized. " + "Received: %s" % self._return) + + return x, _re + + +class ParametricLineBaseSeries(Line2DBaseSeries): + is_parametric = True + + def _set_parametric_line_label(self, label): + """Logic to set the correct label to be shown on the plot. + If `use_cm=True` there will be a colorbar, so we show the parameter. + If `use_cm=False`, there might be a legend, so we show the expressions. + + Parameters + ========== + label : str + label passed in by the pre-processor or the user + """ + self._label = str(self.var) if label is None else label + self._latex_label = latex(self.var) if label is None else label + if (self.use_cm is False) and (self._label == str(self.var)): + self._label = str(self.expr) + self._latex_label = latex(self.expr) + # if the expressions is a lambda function and use_cm=False and no label + # has been provided, then its better to do the following in order to + # avoid surprises on the backend + if any(callable(e) for e in self.expr) and (not self.use_cm): + if self._label == str(self.expr): + self._label = "" + + def get_label(self, use_latex=False, wrapper="$%s$"): + # parametric lines returns the representation of the parameter to be + # shown on the colorbar if `use_cm=True`, otherwise it returns the + # representation of the expression to be placed on the legend. + if self.use_cm: + if str(self.var) == self._label: + if use_latex: + return self._get_wrapped_label(latex(self.var), wrapper) + return str(self.var) + # here the user has provided a custom label + return self._label + if use_latex: + if self._label != str(self.expr): + return self._latex_label + return self._get_wrapped_label(self._latex_label, wrapper) + return self._label + + def _get_data_helper(self): + """Returns coordinates that needs to be postprocessed. + Depending on the `adaptive` option, this function will either use an + adaptive algorithm or it will uniformly sample the expression over the + provided range. + """ + if self.adaptive: + np = import_module("numpy") + coords = self._adaptive_sampling() + coords = [np.array(t) for t in coords] + else: + coords = self._uniform_sampling() + + if self.is_2Dline and self.is_polar: + # when plot_polar is executed with polar_axis=True + np = import_module('numpy') + x, y, _ = coords + r = np.sqrt(x**2 + y**2) + t = np.arctan2(y, x) + coords = [t, r, coords[-1]] + + if callable(self.color_func): + coords = list(coords) + coords[-1] = self.eval_color_func(*coords) + + return coords + + def _uniform_sampling(self): + """Returns coordinates that needs to be postprocessed.""" + np = import_module('numpy') + + results = self._evaluate() + for i, r in enumerate(results): + _re, _im = np.real(r), np.imag(r) + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + results[i] = _re + + return [*results[1:], results[0]] + + def get_parameter_points(self): + return self.get_data()[-1] + + def get_points(self): + """ Return lists of coordinates for plotting. Depending on the + ``adaptive`` option, this function will either use an adaptive algorithm + or it will uniformly sample the expression over the provided range. + + This function is available for back-compatibility purposes. Consider + using ``get_data()`` instead. + + Returns + ======= + x : list + List of x-coordinates + y : list + List of y-coordinates + z : list + List of z-coordinates, only for 3D parametric line plot. + """ + return self._get_data_helper()[:-1] + + @property + def nb_of_points(self): + return self.n[0] + + @nb_of_points.setter + def nb_of_points(self, v): + self.n = v + + +class Parametric2DLineSeries(ParametricLineBaseSeries): + """Representation for a line consisting of two parametric SymPy expressions + over a range.""" + + is_2Dline = True + + def __init__(self, expr_x, expr_y, var_start_end, label="", **kwargs): + super().__init__(**kwargs) + self.expr_x = expr_x if callable(expr_x) else sympify(expr_x) + self.expr_y = expr_y if callable(expr_y) else sympify(expr_y) + self.expr = (self.expr_x, self.expr_y) + self.ranges = [var_start_end] + self._cast = float + self.use_cm = kwargs.get("use_cm", True) + self._set_parametric_line_label(label) + self._post_init() + + def __str__(self): + return self._str_helper( + "parametric cartesian line: (%s, %s) for %s over %s" % ( + str(self.expr_x), + str(self.expr_y), + str(self.var), + str((self.start, self.end)) + )) + + def _adaptive_sampling(self): + try: + if callable(self.expr_x) and callable(self.expr_y): + f_x = self.expr_x + f_y = self.expr_y + else: + f_x = lambdify([self.var], self.expr_x) + f_y = lambdify([self.var], self.expr_y) + x, y, p = self._adaptive_sampling_helper(f_x, f_y) + except Exception as err: + warnings.warn( + "The evaluation with %s failed.\n" % ( + "NumPy/SciPy" if not self.modules else self.modules) + + "{}: {}\n".format(type(err).__name__, err) + + "Trying to evaluate the expression with Sympy, but it might " + "be a slow operation." + ) + f_x = lambdify([self.var], self.expr_x, "sympy") + f_y = lambdify([self.var], self.expr_y, "sympy") + x, y, p = self._adaptive_sampling_helper(f_x, f_y) + return x, y, p + + def _adaptive_sampling_helper(self, f_x, f_y): + """The adaptive sampling is done by recursively checking if three + points are almost collinear. If they are not collinear, then more + points are added between those points. + + References + ========== + + .. [1] Adaptive polygonal approximation of parametric curves, + Luiz Henrique de Figueiredo. + """ + x_coords = [] + y_coords = [] + param = [] + + def sample(param_p, param_q, p, q, depth): + """ Samples recursively if three points are almost collinear. + For depth < 6, points are added irrespective of whether they + satisfy the collinearity condition or not. The maximum depth + allowed is 12. + """ + # Randomly sample to avoid aliasing. + np = import_module('numpy') + random = 0.45 + np.random.rand() * 0.1 + param_new = param_p + random * (param_q - param_p) + xnew = _adaptive_eval(f_x, param_new) + ynew = _adaptive_eval(f_y, param_new) + new_point = np.array([xnew, ynew]) + + # Maximum depth + if depth > self.depth: + x_coords.append(q[0]) + y_coords.append(q[1]) + param.append(param_p) + + # Sample irrespective of whether the line is flat till the + # depth of 6. We are not using linspace to avoid aliasing. + elif depth < 6: + sample(param_p, param_new, p, new_point, depth + 1) + sample(param_new, param_q, new_point, q, depth + 1) + + # Sample ten points if complex values are encountered + # at both ends. If there is a real value in between, then + # sample those points further. + elif ((p[0] is None and q[1] is None) or + (p[1] is None and q[1] is None)): + param_array = np.linspace(param_p, param_q, 10) + x_array = [_adaptive_eval(f_x, t) for t in param_array] + y_array = [_adaptive_eval(f_y, t) for t in param_array] + if not all(x is None and y is None + for x, y in zip(x_array, y_array)): + for i in range(len(y_array) - 1): + if ((x_array[i] is not None and y_array[i] is not None) or + (x_array[i + 1] is not None and y_array[i + 1] is not None)): + point_a = [x_array[i], y_array[i]] + point_b = [x_array[i + 1], y_array[i + 1]] + sample(param_array[i], param_array[i], point_a, + point_b, depth + 1) + + # Sample further if one of the end points in None (i.e. a complex + # value) or the three points are not almost collinear. + elif (p[0] is None or p[1] is None + or q[1] is None or q[0] is None + or not flat(p, new_point, q)): + sample(param_p, param_new, p, new_point, depth + 1) + sample(param_new, param_q, new_point, q, depth + 1) + else: + x_coords.append(q[0]) + y_coords.append(q[1]) + param.append(param_p) + + f_start_x = _adaptive_eval(f_x, self.start) + f_start_y = _adaptive_eval(f_y, self.start) + start = [f_start_x, f_start_y] + f_end_x = _adaptive_eval(f_x, self.end) + f_end_y = _adaptive_eval(f_y, self.end) + end = [f_end_x, f_end_y] + x_coords.append(f_start_x) + y_coords.append(f_start_y) + param.append(self.start) + sample(self.start, self.end, start, end, 0) + + return x_coords, y_coords, param + + +### 3D lines +class Line3DBaseSeries(Line2DBaseSeries): + """A base class for 3D lines. + + Most of the stuff is derived from Line2DBaseSeries.""" + + is_2Dline = False + is_3Dline = True + _dim = 3 + + def __init__(self): + super().__init__() + + +class Parametric3DLineSeries(ParametricLineBaseSeries): + """Representation for a 3D line consisting of three parametric SymPy + expressions and a range.""" + + is_2Dline = False + is_3Dline = True + + def __init__(self, expr_x, expr_y, expr_z, var_start_end, label="", **kwargs): + super().__init__(**kwargs) + self.expr_x = expr_x if callable(expr_x) else sympify(expr_x) + self.expr_y = expr_y if callable(expr_y) else sympify(expr_y) + self.expr_z = expr_z if callable(expr_z) else sympify(expr_z) + self.expr = (self.expr_x, self.expr_y, self.expr_z) + self.ranges = [var_start_end] + self._cast = float + self.adaptive = False + self.use_cm = kwargs.get("use_cm", True) + self._set_parametric_line_label(label) + self._post_init() + # TODO: remove this + self._xlim = None + self._ylim = None + self._zlim = None + + def __str__(self): + return self._str_helper( + "3D parametric cartesian line: (%s, %s, %s) for %s over %s" % ( + str(self.expr_x), + str(self.expr_y), + str(self.expr_z), + str(self.var), + str((self.start, self.end)) + )) + + def get_data(self): + # TODO: remove this + np = import_module("numpy") + x, y, z, p = super().get_data() + self._xlim = (np.amin(x), np.amax(x)) + self._ylim = (np.amin(y), np.amax(y)) + self._zlim = (np.amin(z), np.amax(z)) + return x, y, z, p + + +### Surfaces +class SurfaceBaseSeries(BaseSeries): + """A base class for 3D surfaces.""" + + is_3Dsurface = True + + def __init__(self, *args, **kwargs): + super().__init__(**kwargs) + self.use_cm = kwargs.get("use_cm", False) + # NOTE: why should SurfaceOver2DRangeSeries support is polar? + # After all, the same result can be achieve with + # ParametricSurfaceSeries. For example: + # sin(r) for (r, 0, 2 * pi) and (theta, 0, pi/2) can be parameterized + # as (r * cos(theta), r * sin(theta), sin(t)) for (r, 0, 2 * pi) and + # (theta, 0, pi/2). + # Because it is faster to evaluate (important for interactive plots). + self.is_polar = kwargs.get("is_polar", kwargs.get("polar", False)) + self.surface_color = kwargs.get("surface_color", None) + self.color_func = kwargs.get("color_func", lambda x, y, z: z) + if callable(self.surface_color): + self.color_func = self.surface_color + self.surface_color = None + + def _set_surface_label(self, label): + exprs = self.expr + self._label = str(exprs) if label is None else label + self._latex_label = latex(exprs) if label is None else label + # if the expressions is a lambda function and no label + # has been provided, then its better to do the following to avoid + # surprises on the backend + is_lambda = (callable(exprs) if not hasattr(exprs, "__iter__") + else any(callable(e) for e in exprs)) + if is_lambda and (self._label == str(exprs)): + self._label = "" + self._latex_label = "" + + def get_color_array(self): + np = import_module('numpy') + c = self.surface_color + if isinstance(c, Callable): + f = np.vectorize(c) + nargs = arity(c) + if self.is_parametric: + variables = list(map(centers_of_faces, self.get_parameter_meshes())) + if nargs == 1: + return f(variables[0]) + elif nargs == 2: + return f(*variables) + variables = list(map(centers_of_faces, self.get_meshes())) + if nargs == 1: + return f(variables[0]) + elif nargs == 2: + return f(*variables[:2]) + else: + return f(*variables) + else: + if isinstance(self, SurfaceOver2DRangeSeries): + return c*np.ones(min(self.nb_of_points_x, self.nb_of_points_y)) + else: + return c*np.ones(min(self.nb_of_points_u, self.nb_of_points_v)) + + +class SurfaceOver2DRangeSeries(SurfaceBaseSeries): + """Representation for a 3D surface consisting of a SymPy expression and 2D + range.""" + + def __init__(self, expr, var_start_end_x, var_start_end_y, label="", **kwargs): + super().__init__(**kwargs) + self.expr = expr if callable(expr) else sympify(expr) + self.ranges = [var_start_end_x, var_start_end_y] + self._set_surface_label(label) + self._post_init() + # TODO: remove this + self._xlim = (self.start_x, self.end_x) + self._ylim = (self.start_y, self.end_y) + + @property + def var_x(self): + return self.ranges[0][0] + + @property + def var_y(self): + return self.ranges[1][0] + + @property + def start_x(self): + try: + return float(self.ranges[0][1]) + except TypeError: + return self.ranges[0][1] + + @property + def end_x(self): + try: + return float(self.ranges[0][2]) + except TypeError: + return self.ranges[0][2] + + @property + def start_y(self): + try: + return float(self.ranges[1][1]) + except TypeError: + return self.ranges[1][1] + + @property + def end_y(self): + try: + return float(self.ranges[1][2]) + except TypeError: + return self.ranges[1][2] + + @property + def nb_of_points_x(self): + return self.n[0] + + @nb_of_points_x.setter + def nb_of_points_x(self, v): + n = self.n + self.n = [v, n[1:]] + + @property + def nb_of_points_y(self): + return self.n[1] + + @nb_of_points_y.setter + def nb_of_points_y(self, v): + n = self.n + self.n = [n[0], v, n[2]] + + def __str__(self): + series_type = "cartesian surface" if self.is_3Dsurface else "contour" + return self._str_helper( + series_type + ": %s for" " %s over %s and %s over %s" % ( + str(self.expr), + str(self.var_x), str((self.start_x, self.end_x)), + str(self.var_y), str((self.start_y, self.end_y)), + )) + + def get_meshes(self): + """Return the x,y,z coordinates for plotting the surface. + This function is available for back-compatibility purposes. Consider + using ``get_data()`` instead. + """ + return self.get_data() + + def get_data(self): + """Return arrays of coordinates for plotting. + + Returns + ======= + mesh_x : np.ndarray + Discretized x-domain. + mesh_y : np.ndarray + Discretized y-domain. + mesh_z : np.ndarray + Results of the evaluation. + """ + np = import_module('numpy') + + results = self._evaluate() + # mask out complex values + for i, r in enumerate(results): + _re, _im = np.real(r), np.imag(r) + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + results[i] = _re + + x, y, z = results + if self.is_polar and self.is_3Dsurface: + r = x.copy() + x = r * np.cos(y) + y = r * np.sin(y) + + # TODO: remove this + self._zlim = (np.amin(z), np.amax(z)) + + return self._apply_transform(x, y, z) + + +class ParametricSurfaceSeries(SurfaceBaseSeries): + """Representation for a 3D surface consisting of three parametric SymPy + expressions and a range.""" + + is_parametric = True + + def __init__(self, expr_x, expr_y, expr_z, + var_start_end_u, var_start_end_v, label="", **kwargs): + super().__init__(**kwargs) + self.expr_x = expr_x if callable(expr_x) else sympify(expr_x) + self.expr_y = expr_y if callable(expr_y) else sympify(expr_y) + self.expr_z = expr_z if callable(expr_z) else sympify(expr_z) + self.expr = (self.expr_x, self.expr_y, self.expr_z) + self.ranges = [var_start_end_u, var_start_end_v] + self.color_func = kwargs.get("color_func", lambda x, y, z, u, v: z) + self._set_surface_label(label) + self._post_init() + + @property + def var_u(self): + return self.ranges[0][0] + + @property + def var_v(self): + return self.ranges[1][0] + + @property + def start_u(self): + try: + return float(self.ranges[0][1]) + except TypeError: + return self.ranges[0][1] + + @property + def end_u(self): + try: + return float(self.ranges[0][2]) + except TypeError: + return self.ranges[0][2] + + @property + def start_v(self): + try: + return float(self.ranges[1][1]) + except TypeError: + return self.ranges[1][1] + + @property + def end_v(self): + try: + return float(self.ranges[1][2]) + except TypeError: + return self.ranges[1][2] + + @property + def nb_of_points_u(self): + return self.n[0] + + @nb_of_points_u.setter + def nb_of_points_u(self, v): + n = self.n + self.n = [v, n[1:]] + + @property + def nb_of_points_v(self): + return self.n[1] + + @nb_of_points_v.setter + def nb_of_points_v(self, v): + n = self.n + self.n = [n[0], v, n[2]] + + def __str__(self): + return self._str_helper( + "parametric cartesian surface: (%s, %s, %s) for" + " %s over %s and %s over %s" % ( + str(self.expr_x), str(self.expr_y), str(self.expr_z), + str(self.var_u), str((self.start_u, self.end_u)), + str(self.var_v), str((self.start_v, self.end_v)), + )) + + def get_parameter_meshes(self): + return self.get_data()[3:] + + def get_meshes(self): + """Return the x,y,z coordinates for plotting the surface. + This function is available for back-compatibility purposes. Consider + using ``get_data()`` instead. + """ + return self.get_data()[:3] + + def get_data(self): + """Return arrays of coordinates for plotting. + + Returns + ======= + x : np.ndarray [n2 x n1] + x-coordinates. + y : np.ndarray [n2 x n1] + y-coordinates. + z : np.ndarray [n2 x n1] + z-coordinates. + mesh_u : np.ndarray [n2 x n1] + Discretized u range. + mesh_v : np.ndarray [n2 x n1] + Discretized v range. + """ + np = import_module('numpy') + + results = self._evaluate() + # mask out complex values + for i, r in enumerate(results): + _re, _im = np.real(r), np.imag(r) + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + results[i] = _re + + # TODO: remove this + x, y, z = results[2:] + self._xlim = (np.amin(x), np.amax(x)) + self._ylim = (np.amin(y), np.amax(y)) + self._zlim = (np.amin(z), np.amax(z)) + + return self._apply_transform(*results[2:], *results[:2]) + + +### Contours +class ContourSeries(SurfaceOver2DRangeSeries): + """Representation for a contour plot.""" + + is_3Dsurface = False + is_contour = True + + def __init__(self, *args, **kwargs): + super().__init__(*args, **kwargs) + self.is_filled = kwargs.get("is_filled", kwargs.get("fill", True)) + self.show_clabels = kwargs.get("clabels", True) + + # NOTE: contour plots are used by plot_contour, plot_vector and + # plot_complex_vector. By implementing contour_kw we are able to + # quickly target the contour plot. + self.rendering_kw = kwargs.get("contour_kw", + kwargs.get("rendering_kw", {})) + + +class GenericDataSeries(BaseSeries): + """Represents generic numerical data. + + Notes + ===== + This class serves the purpose of back-compatibility with the "markers, + annotations, fill, rectangles" keyword arguments that represent + user-provided numerical data. In particular, it solves the problem of + combining together two or more plot-objects with the ``extend`` or + ``append`` methods: user-provided numerical data is also taken into + consideration because it is stored in this series class. + + Also note that the current implementation is far from optimal, as each + keyword argument is stored into an attribute in the ``Plot`` class, which + requires a hard-coded if-statement in the ``MatplotlibBackend`` class. + The implementation suggests that it is ok to add attributes and + if-statements to provide more and more functionalities for user-provided + numerical data (e.g. adding horizontal lines, or vertical lines, or bar + plots, etc). However, in doing so one would reinvent the wheel: plotting + libraries (like Matplotlib) already implements the necessary API. + + Instead of adding more keyword arguments and attributes, users interested + in adding custom numerical data to a plot should retrieve the figure + created by this plotting module. For example, this code: + + .. plot:: + :context: close-figs + :include-source: True + + from sympy import Symbol, plot, cos + x = Symbol("x") + p = plot(cos(x), markers=[{"args": [[0, 1, 2], [0, 1, -1], "*"]}]) + + Becomes: + + .. plot:: + :context: close-figs + :include-source: True + + p = plot(cos(x), backend="matplotlib") + fig, ax = p._backend.fig, p._backend.ax + ax.plot([0, 1, 2], [0, 1, -1], "*") + fig + + Which is far better in terms of readability. Also, it gives access to the + full plotting library capabilities, without the need to reinvent the wheel. + """ + is_generic = True + + def __init__(self, tp, *args, **kwargs): + self.type = tp + self.args = args + self.rendering_kw = kwargs + + def get_data(self): + return self.args + + +class ImplicitSeries(BaseSeries): + """Representation for 2D Implicit plot.""" + + is_implicit = True + use_cm = False + _N = 100 + + def __init__(self, expr, var_start_end_x, var_start_end_y, label="", **kwargs): + super().__init__(**kwargs) + self.adaptive = kwargs.get("adaptive", False) + self.expr = expr + self._label = str(expr) if label is None else label + self._latex_label = latex(expr) if label is None else label + self.ranges = [var_start_end_x, var_start_end_y] + self.var_x, self.start_x, self.end_x = self.ranges[0] + self.var_y, self.start_y, self.end_y = self.ranges[1] + self._color = kwargs.get("color", kwargs.get("line_color", None)) + + if self.is_interactive and self.adaptive: + raise NotImplementedError("Interactive plot with `adaptive=True` " + "is not supported.") + + # Check whether the depth is greater than 4 or less than 0. + depth = kwargs.get("depth", 0) + if depth > 4: + depth = 4 + elif depth < 0: + depth = 0 + self.depth = 4 + depth + self._post_init() + + @property + def expr(self): + if self.adaptive: + return self._adaptive_expr + return self._non_adaptive_expr + + @expr.setter + def expr(self, expr): + self._block_lambda_functions(expr) + # these are needed for adaptive evaluation + expr, has_equality = self._has_equality(sympify(expr)) + self._adaptive_expr = expr + self.has_equality = has_equality + self._label = str(expr) + self._latex_label = latex(expr) + + if isinstance(expr, (BooleanFunction, Ne)) and (not self.adaptive): + self.adaptive = True + msg = "contains Boolean functions. " + if isinstance(expr, Ne): + msg = "is an unequality. " + warnings.warn( + "The provided expression " + msg + + "In order to plot the expression, the algorithm " + + "automatically switched to an adaptive sampling." + ) + + if isinstance(expr, BooleanFunction): + self._non_adaptive_expr = None + self._is_equality = False + else: + # these are needed for uniform meshing evaluation + expr, is_equality = self._preprocess_meshgrid_expression(expr, self.adaptive) + self._non_adaptive_expr = expr + self._is_equality = is_equality + + @property + def line_color(self): + return self._color + + @line_color.setter + def line_color(self, v): + self._color = v + + color = line_color + + def _has_equality(self, expr): + # Represents whether the expression contains an Equality, GreaterThan + # or LessThan + has_equality = False + + def arg_expand(bool_expr): + """Recursively expands the arguments of an Boolean Function""" + for arg in bool_expr.args: + if isinstance(arg, BooleanFunction): + arg_expand(arg) + elif isinstance(arg, Relational): + arg_list.append(arg) + + arg_list = [] + if isinstance(expr, BooleanFunction): + arg_expand(expr) + # Check whether there is an equality in the expression provided. + if any(isinstance(e, (Equality, GreaterThan, LessThan)) for e in arg_list): + has_equality = True + elif not isinstance(expr, Relational): + expr = Equality(expr, 0) + has_equality = True + elif isinstance(expr, (Equality, GreaterThan, LessThan)): + has_equality = True + + return expr, has_equality + + def __str__(self): + f = lambda t: float(t) if len(t.free_symbols) == 0 else t + + return self._str_helper( + "Implicit expression: %s for %s over %s and %s over %s") % ( + str(self._adaptive_expr), + str(self.var_x), + str((f(self.start_x), f(self.end_x))), + str(self.var_y), + str((f(self.start_y), f(self.end_y))), + ) + + def get_data(self): + """Returns numerical data. + + Returns + ======= + + If the series is evaluated with the `adaptive=True` it returns: + + interval_list : list + List of bounding rectangular intervals to be postprocessed and + eventually used with Matplotlib's ``fill`` command. + dummy : str + A string containing ``"fill"``. + + Otherwise, it returns 2D numpy arrays to be used with Matplotlib's + ``contour`` or ``contourf`` commands: + + x_array : np.ndarray + y_array : np.ndarray + z_array : np.ndarray + plot_type : str + A string specifying which plot command to use, ``"contour"`` + or ``"contourf"``. + """ + if self.adaptive: + data = self._adaptive_eval() + if data is not None: + return data + + return self._get_meshes_grid() + + def _adaptive_eval(self): + """ + References + ========== + + .. [1] Jeffrey Allen Tupper. Reliable Two-Dimensional Graphing Methods for + Mathematical Formulae with Two Free Variables. + + .. [2] Jeffrey Allen Tupper. Graphing Equations with Generalized Interval + Arithmetic. Master's thesis. University of Toronto, 1996 + """ + import sympy.plotting.intervalmath.lib_interval as li + + user_functions = {} + printer = IntervalMathPrinter({ + 'fully_qualified_modules': False, 'inline': True, + 'allow_unknown_functions': True, + 'user_functions': user_functions}) + + keys = [t for t in dir(li) if ("__" not in t) and (t not in ["import_module", "interval"])] + vals = [getattr(li, k) for k in keys] + d = dict(zip(keys, vals)) + func = lambdify((self.var_x, self.var_y), self.expr, modules=[d], printer=printer) + data = None + + try: + data = self._get_raster_interval(func) + except NameError as err: + warnings.warn( + "Adaptive meshing could not be applied to the" + " expression, as some functions are not yet implemented" + " in the interval math module:\n\n" + "NameError: %s\n\n" % err + + "Proceeding with uniform meshing." + ) + self.adaptive = False + except TypeError: + warnings.warn( + "Adaptive meshing could not be applied to the" + " expression. Using uniform meshing.") + self.adaptive = False + + return data + + def _get_raster_interval(self, func): + """Uses interval math to adaptively mesh and obtain the plot""" + np = import_module('numpy') + + k = self.depth + interval_list = [] + sx, sy = [float(t) for t in [self.start_x, self.start_y]] + ex, ey = [float(t) for t in [self.end_x, self.end_y]] + # Create initial 32 divisions + xsample = np.linspace(sx, ex, 33) + ysample = np.linspace(sy, ey, 33) + + # Add a small jitter so that there are no false positives for equality. + # Ex: y==x becomes True for x interval(1, 2) and y interval(1, 2) + # which will draw a rectangle. + jitterx = ( + (np.random.rand(len(xsample)) * 2 - 1) + * (ex - sx) + / 2 ** 20 + ) + jittery = ( + (np.random.rand(len(ysample)) * 2 - 1) + * (ey - sy) + / 2 ** 20 + ) + xsample += jitterx + ysample += jittery + + xinter = [interval(x1, x2) for x1, x2 in zip(xsample[:-1], xsample[1:])] + yinter = [interval(y1, y2) for y1, y2 in zip(ysample[:-1], ysample[1:])] + interval_list = [[x, y] for x in xinter for y in yinter] + plot_list = [] + + # recursive call refinepixels which subdivides the intervals which are + # neither True nor False according to the expression. + def refine_pixels(interval_list): + """Evaluates the intervals and subdivides the interval if the + expression is partially satisfied.""" + temp_interval_list = [] + plot_list = [] + for intervals in interval_list: + + # Convert the array indices to x and y values + intervalx = intervals[0] + intervaly = intervals[1] + func_eval = func(intervalx, intervaly) + # The expression is valid in the interval. Change the contour + # array values to 1. + if func_eval[1] is False or func_eval[0] is False: + pass + elif func_eval == (True, True): + plot_list.append([intervalx, intervaly]) + elif func_eval[1] is None or func_eval[0] is None: + # Subdivide + avgx = intervalx.mid + avgy = intervaly.mid + a = interval(intervalx.start, avgx) + b = interval(avgx, intervalx.end) + c = interval(intervaly.start, avgy) + d = interval(avgy, intervaly.end) + temp_interval_list.append([a, c]) + temp_interval_list.append([a, d]) + temp_interval_list.append([b, c]) + temp_interval_list.append([b, d]) + return temp_interval_list, plot_list + + while k >= 0 and len(interval_list): + interval_list, plot_list_temp = refine_pixels(interval_list) + plot_list.extend(plot_list_temp) + k = k - 1 + # Check whether the expression represents an equality + # If it represents an equality, then none of the intervals + # would have satisfied the expression due to floating point + # differences. Add all the undecided values to the plot. + if self.has_equality: + for intervals in interval_list: + intervalx = intervals[0] + intervaly = intervals[1] + func_eval = func(intervalx, intervaly) + if func_eval[1] and func_eval[0] is not False: + plot_list.append([intervalx, intervaly]) + return plot_list, "fill" + + def _get_meshes_grid(self): + """Generates the mesh for generating a contour. + + In the case of equality, ``contour`` function of matplotlib can + be used. In other cases, matplotlib's ``contourf`` is used. + """ + np = import_module('numpy') + + xarray, yarray, z_grid = self._evaluate() + _re, _im = np.real(z_grid), np.imag(z_grid) + _re[np.invert(np.isclose(_im, np.zeros_like(_im)))] = np.nan + if self._is_equality: + return xarray, yarray, _re, 'contour' + return xarray, yarray, _re, 'contourf' + + @staticmethod + def _preprocess_meshgrid_expression(expr, adaptive): + """If the expression is a Relational, rewrite it as a single + expression. + + Returns + ======= + + expr : Expr + The rewritten expression + + equality : Boolean + Whether the original expression was an Equality or not. + """ + equality = False + if isinstance(expr, Equality): + expr = expr.lhs - expr.rhs + equality = True + elif isinstance(expr, Relational): + expr = expr.gts - expr.lts + elif not adaptive: + raise NotImplementedError( + "The expression is not supported for " + "plotting in uniform meshed plot." + ) + return expr, equality + + def get_label(self, use_latex=False, wrapper="$%s$"): + """Return the label to be used to display the expression. + + Parameters + ========== + use_latex : bool + If False, the string representation of the expression is returned. + If True, the latex representation is returned. + wrapper : str + The backend might need the latex representation to be wrapped by + some characters. Default to ``"$%s$"``. + + Returns + ======= + label : str + """ + if use_latex is False: + return self._label + if self._label == str(self._adaptive_expr): + return self._get_wrapped_label(self._latex_label, wrapper) + return self._latex_label + + +############################################################################## +# Finding the centers of line segments or mesh faces +############################################################################## + +def centers_of_segments(array): + np = import_module('numpy') + return np.mean(np.vstack((array[:-1], array[1:])), 0) + + +def centers_of_faces(array): + np = import_module('numpy') + return np.mean(np.dstack((array[:-1, :-1], + array[1:, :-1], + array[:-1, 1:], + array[:-1, :-1], + )), 2) + + +def flat(x, y, z, eps=1e-3): + """Checks whether three points are almost collinear""" + np = import_module('numpy') + # Workaround plotting piecewise (#8577) + vector_a = (x - y).astype(float) + vector_b = (z - y).astype(float) + dot_product = np.dot(vector_a, vector_b) + vector_a_norm = np.linalg.norm(vector_a) + vector_b_norm = np.linalg.norm(vector_b) + cos_theta = dot_product / (vector_a_norm * vector_b_norm) + return abs(cos_theta + 1) < eps + + +def _set_discretization_points(kwargs, pt): + """Allow the use of the keyword arguments ``n, n1, n2`` to + specify the number of discretization points in one and two + directions, while keeping back-compatibility with older keyword arguments + like, ``nb_of_points, nb_of_points_*, points``. + + Parameters + ========== + + kwargs : dict + Dictionary of keyword arguments passed into a plotting function. + pt : type + The type of the series, which indicates the kind of plot we are + trying to create. + """ + replace_old_keywords = { + "nb_of_points": "n", + "nb_of_points_x": "n1", + "nb_of_points_y": "n2", + "nb_of_points_u": "n1", + "nb_of_points_v": "n2", + "points": "n" + } + for k, v in replace_old_keywords.items(): + if k in kwargs.keys(): + kwargs[v] = kwargs.pop(k) + + if pt in [LineOver1DRangeSeries, Parametric2DLineSeries, + Parametric3DLineSeries]: + if "n" in kwargs.keys(): + kwargs["n1"] = kwargs["n"] + if hasattr(kwargs["n"], "__iter__") and (len(kwargs["n"]) > 0): + kwargs["n1"] = kwargs["n"][0] + elif pt in [SurfaceOver2DRangeSeries, ContourSeries, + ParametricSurfaceSeries, ImplicitSeries]: + if "n" in kwargs.keys(): + if hasattr(kwargs["n"], "__iter__") and (len(kwargs["n"]) > 1): + kwargs["n1"] = kwargs["n"][0] + kwargs["n2"] = kwargs["n"][1] + else: + kwargs["n1"] = kwargs["n2"] = kwargs["n"] + return kwargs diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_experimental_lambdify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_experimental_lambdify.py new file mode 100644 index 0000000000000000000000000000000000000000..95839d668762be7be94d0de5092594306ceeadbd --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_experimental_lambdify.py @@ -0,0 +1,77 @@ +from sympy.core.symbol import symbols, Symbol +from sympy.functions import Max +from sympy.plotting.experimental_lambdify import experimental_lambdify +from sympy.plotting.intervalmath.interval_arithmetic import \ + interval, intervalMembership + + +# Tests for exception handling in experimental_lambdify +def test_experimental_lambify(): + x = Symbol('x') + f = experimental_lambdify([x], Max(x, 5)) + # XXX should f be tested? If f(2) is attempted, an + # error is raised because a complex produced during wrapping of the arg + # is being compared with an int. + assert Max(2, 5) == 5 + assert Max(5, 7) == 7 + + x = Symbol('x-3') + f = experimental_lambdify([x], x + 1) + assert f(1) == 2 + + +def test_composite_boolean_region(): + x, y = symbols('x y') + + r1 = (x - 1)**2 + y**2 < 2 + r2 = (x + 1)**2 + y**2 < 2 + + f = experimental_lambdify((x, y), r1 & r2) + a = (interval(-0.1, 0.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(-1.1, -0.9), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(0.9, 1.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-0.1, 0.1), interval(1.9, 2.1)) + assert f(*a) == intervalMembership(False, True) + + f = experimental_lambdify((x, y), r1 | r2) + a = (interval(-0.1, 0.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(-1.1, -0.9), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(0.9, 1.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(-0.1, 0.1), interval(1.9, 2.1)) + assert f(*a) == intervalMembership(False, True) + + f = experimental_lambdify((x, y), r1 & ~r2) + a = (interval(-0.1, 0.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-1.1, -0.9), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(0.9, 1.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(-0.1, 0.1), interval(1.9, 2.1)) + assert f(*a) == intervalMembership(False, True) + + f = experimental_lambdify((x, y), ~r1 & r2) + a = (interval(-0.1, 0.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-1.1, -0.9), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(True, True) + a = (interval(0.9, 1.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-0.1, 0.1), interval(1.9, 2.1)) + assert f(*a) == intervalMembership(False, True) + + f = experimental_lambdify((x, y), ~r1 & ~r2) + a = (interval(-0.1, 0.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-1.1, -0.9), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(0.9, 1.1), interval(-0.1, 0.1)) + assert f(*a) == intervalMembership(False, True) + a = (interval(-0.1, 0.1), interval(1.9, 2.1)) + assert f(*a) == intervalMembership(True, True) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot.py new file mode 100644 index 0000000000000000000000000000000000000000..e5246c38a19552222aa62720d3f5e9e320344662 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot.py @@ -0,0 +1,1344 @@ +import os +from tempfile import TemporaryDirectory +import pytest +from sympy.concrete.summations import Sum +from sympy.core.numbers import (I, oo, pi) +from sympy.core.relational import Ne +from sympy.core.symbol import Symbol, symbols +from sympy.functions.elementary.exponential import (LambertW, exp, exp_polar, log) +from sympy.functions.elementary.miscellaneous import (real_root, sqrt) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.elementary.miscellaneous import Min +from sympy.functions.special.hyper import meijerg +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import And +from sympy.core.singleton import S +from sympy.core.sympify import sympify +from sympy.external import import_module +from sympy.plotting.plot import ( + Plot, plot, plot_parametric, plot3d_parametric_line, plot3d, + plot3d_parametric_surface) +from sympy.plotting.plot import ( + unset_show, plot_contour, PlotGrid, MatplotlibBackend, TextBackend) +from sympy.plotting.series import ( + LineOver1DRangeSeries, Parametric2DLineSeries, Parametric3DLineSeries, + ParametricSurfaceSeries, SurfaceOver2DRangeSeries) +from sympy.testing.pytest import skip, skip_under_pyodide, warns, raises, warns_deprecated_sympy +from sympy.utilities import lambdify as lambdify_ +from sympy.utilities.exceptions import ignore_warnings + +unset_show() + + +matplotlib = import_module( + 'matplotlib', min_module_version='1.1.0', catch=(RuntimeError,)) + + +class DummyBackendNotOk(Plot): + """ Used to verify if users can create their own backends. + This backend is meant to raise NotImplementedError for methods `show`, + `save`, `close`. + """ + def __new__(cls, *args, **kwargs): + return object.__new__(cls) + + +class DummyBackendOk(Plot): + """ Used to verify if users can create their own backends. + This backend is meant to pass all tests. + """ + def __new__(cls, *args, **kwargs): + return object.__new__(cls) + + def show(self): + pass + + def save(self): + pass + + def close(self): + pass + +def test_basic_plotting_backend(): + x = Symbol('x') + plot(x, (x, 0, 3), backend='text') + plot(x**2 + 1, (x, 0, 3), backend='text') + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_and_save_1(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + ### + # Examples from the 'introduction' notebook + ### + p = plot(x, legend=True, label='f1', adaptive=adaptive, n=10) + p = plot(x*sin(x), x*cos(x), label='f2', adaptive=adaptive, n=10) + p.extend(p) + p[0].line_color = lambda a: a + p[1].line_color = 'b' + p.title = 'Big title' + p.xlabel = 'the x axis' + p[1].label = 'straight line' + p.legend = True + p.aspect_ratio = (1, 1) + p.xlim = (-15, 20) + filename = 'test_basic_options_and_colors.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p.extend(plot(x + 1, adaptive=adaptive, n=10)) + p.append(plot(x + 3, x**2, adaptive=adaptive, n=10)[1]) + filename = 'test_plot_extend_append.png' + p.save(os.path.join(tmpdir, filename)) + + p[2] = plot(x**2, (x, -2, 3), adaptive=adaptive, n=10) + filename = 'test_plot_setitem.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot(sin(x), (x, -2*pi, 4*pi), adaptive=adaptive, n=10) + filename = 'test_line_explicit.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot(sin(x), adaptive=adaptive, n=10) + filename = 'test_line_default_range.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot((x**2, (x, -5, 5)), (x**3, (x, -3, 3)), adaptive=adaptive, n=10) + filename = 'test_line_multiple_range.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + raises(ValueError, lambda: plot(x, y)) + + #Piecewise plots + p = plot(Piecewise((1, x > 0), (0, True)), (x, -1, 1), adaptive=adaptive, n=10) + filename = 'test_plot_piecewise.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot(Piecewise((x, x < 1), (x**2, True)), (x, -3, 3), adaptive=adaptive, n=10) + filename = 'test_plot_piecewise_2.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # test issue 7471 + p1 = plot(x, adaptive=adaptive, n=10) + p2 = plot(3, adaptive=adaptive, n=10) + p1.extend(p2) + filename = 'test_horizontal_line.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # test issue 10925 + f = Piecewise((-1, x < -1), (x, And(-1 <= x, x < 0)), \ + (x**2, And(0 <= x, x < 1)), (x**3, x >= 1)) + p = plot(f, (x, -3, 3), adaptive=adaptive, n=10) + filename = 'test_plot_piecewise_3.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_and_save_2(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + #parametric 2d plots. + #Single plot with default range. + p = plot_parametric(sin(x), cos(x), adaptive=adaptive, n=10) + filename = 'test_parametric.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #Single plot with range. + p = plot_parametric( + sin(x), cos(x), (x, -5, 5), legend=True, label='parametric_plot', + adaptive=adaptive, n=10) + filename = 'test_parametric_range.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #Multiple plots with same range. + p = plot_parametric((sin(x), cos(x)), (x, sin(x)), + adaptive=adaptive, n=10) + filename = 'test_parametric_multiple.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #Multiple plots with different ranges. + p = plot_parametric( + (sin(x), cos(x), (x, -3, 3)), (x, sin(x), (x, -5, 5)), + adaptive=adaptive, n=10) + filename = 'test_parametric_multiple_ranges.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #depth of recursion specified. + p = plot_parametric(x, sin(x), depth=13, + adaptive=adaptive, n=10) + filename = 'test_recursion_depth.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #No adaptive sampling. + p = plot_parametric(cos(x), sin(x), adaptive=False, n=500) + filename = 'test_adaptive.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + #3d parametric plots + p = plot3d_parametric_line( + sin(x), cos(x), x, legend=True, label='3d_parametric_plot', + adaptive=adaptive, n=10) + filename = 'test_3d_line.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot3d_parametric_line( + (sin(x), cos(x), x, (x, -5, 5)), (cos(x), sin(x), x, (x, -3, 3)), + adaptive=adaptive, n=10) + filename = 'test_3d_line_multiple.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot3d_parametric_line(sin(x), cos(x), x, n=30, + adaptive=adaptive) + filename = 'test_3d_line_points.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # 3d surface single plot. + p = plot3d(x * y, adaptive=adaptive, n=10) + filename = 'test_surface.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Multiple 3D plots with same range. + p = plot3d(-x * y, x * y, (x, -5, 5), adaptive=adaptive, n=10) + filename = 'test_surface_multiple.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Multiple 3D plots with different ranges. + p = plot3d( + (x * y, (x, -3, 3), (y, -3, 3)), (-x * y, (x, -3, 3), (y, -3, 3)), + adaptive=adaptive, n=10) + filename = 'test_surface_multiple_ranges.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Single Parametric 3D plot + p = plot3d_parametric_surface(sin(x + y), cos(x - y), x - y, + adaptive=adaptive, n=10) + filename = 'test_parametric_surface.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Multiple Parametric 3D plots. + p = plot3d_parametric_surface( + (x*sin(z), x*cos(z), z, (x, -5, 5), (z, -5, 5)), + (sin(x + y), cos(x - y), x - y, (x, -5, 5), (y, -5, 5)), + adaptive=adaptive, n=10) + filename = 'test_parametric_surface.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Single Contour plot. + p = plot_contour(sin(x)*sin(y), (x, -5, 5), (y, -5, 5), + adaptive=adaptive, n=10) + filename = 'test_contour_plot.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Multiple Contour plots with same range. + p = plot_contour(x**2 + y**2, x**3 + y**3, (x, -5, 5), (y, -5, 5), + adaptive=adaptive, n=10) + filename = 'test_contour_plot.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # Multiple Contour plots with different range. + p = plot_contour( + (x**2 + y**2, (x, -5, 5), (y, -5, 5)), + (x**3 + y**3, (x, -3, 3), (y, -3, 3)), + adaptive=adaptive, n=10) + filename = 'test_contour_plot.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_and_save_3(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + ### + # Examples from the 'colors' notebook + ### + + p = plot(sin(x), adaptive=adaptive, n=10) + p[0].line_color = lambda a: a + filename = 'test_colors_line_arity1.png' + p.save(os.path.join(tmpdir, filename)) + + p[0].line_color = lambda a, b: b + filename = 'test_colors_line_arity2.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot(x*sin(x), x*cos(x), (x, 0, 10), adaptive=adaptive, n=10) + p[0].line_color = lambda a: a + filename = 'test_colors_param_line_arity1.png' + p.save(os.path.join(tmpdir, filename)) + + p[0].line_color = lambda a, b: a + filename = 'test_colors_param_line_arity1.png' + p.save(os.path.join(tmpdir, filename)) + + p[0].line_color = lambda a, b: b + filename = 'test_colors_param_line_arity2b.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot3d_parametric_line( + sin(x) + 0.1*sin(x)*cos(7*x), + cos(x) + 0.1*cos(x)*cos(7*x), + 0.1*sin(7*x), + (x, 0, 2*pi), adaptive=adaptive, n=10) + p[0].line_color = lambdify_(x, sin(4*x)) + filename = 'test_colors_3d_line_arity1.png' + p.save(os.path.join(tmpdir, filename)) + p[0].line_color = lambda a, b: b + filename = 'test_colors_3d_line_arity2.png' + p.save(os.path.join(tmpdir, filename)) + p[0].line_color = lambda a, b, c: c + filename = 'test_colors_3d_line_arity3.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot3d(sin(x)*y, (x, 0, 6*pi), (y, -5, 5), adaptive=adaptive, n=10) + p[0].surface_color = lambda a: a + filename = 'test_colors_surface_arity1.png' + p.save(os.path.join(tmpdir, filename)) + p[0].surface_color = lambda a, b: b + filename = 'test_colors_surface_arity2.png' + p.save(os.path.join(tmpdir, filename)) + p[0].surface_color = lambda a, b, c: c + filename = 'test_colors_surface_arity3a.png' + p.save(os.path.join(tmpdir, filename)) + p[0].surface_color = lambdify_((x, y, z), sqrt((x - 3*pi)**2 + y**2)) + filename = 'test_colors_surface_arity3b.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot3d_parametric_surface(x * cos(4 * y), x * sin(4 * y), y, + (x, -1, 1), (y, -1, 1), adaptive=adaptive, n=10) + p[0].surface_color = lambda a: a + filename = 'test_colors_param_surf_arity1.png' + p.save(os.path.join(tmpdir, filename)) + p[0].surface_color = lambda a, b: a*b + filename = 'test_colors_param_surf_arity2.png' + p.save(os.path.join(tmpdir, filename)) + p[0].surface_color = lambdify_((x, y, z), sqrt(x**2 + y**2 + z**2)) + filename = 'test_colors_param_surf_arity3.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True]) +def test_plot_and_save_4(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + + ### + # Examples from the 'advanced' notebook + ### + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + i = Integral(log((sin(x)**2 + 1)*sqrt(x**2 + 1)), (x, 0, y)) + p = plot(i, (y, 1, 5), adaptive=adaptive, n=10, force_real_eval=True) + filename = 'test_advanced_integral.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_and_save_5(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + s = Sum(1/x**y, (x, 1, oo)) + p = plot(s, (y, 2, 10), adaptive=adaptive, n=10) + filename = 'test_advanced_inf_sum.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p = plot(Sum(1/x, (x, 1, y)), (y, 2, 10), show=False, + adaptive=adaptive, n=10) + p[0].only_integers = True + p[0].steps = True + filename = 'test_advanced_fin_sum.png' + + # XXX: This should be fixed in experimental_lambdify or by using + # ordinary lambdify so that it doesn't warn. The error results from + # passing an array of values as the integration limit. + # + # UserWarning: The evaluation of the expression is problematic. We are + # trying a failback method that may still work. Please report this as a + # bug. + with ignore_warnings(UserWarning): + p.save(os.path.join(tmpdir, filename)) + + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_and_save_6(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + filename = 'test.png' + ### + # Test expressions that can not be translated to np and generate complex + # results. + ### + p = plot(sin(x) + I*cos(x)) + p.save(os.path.join(tmpdir, filename)) + + with ignore_warnings(RuntimeWarning): + p = plot(sqrt(sqrt(-x))) + p.save(os.path.join(tmpdir, filename)) + + p = plot(LambertW(x)) + p.save(os.path.join(tmpdir, filename)) + p = plot(sqrt(LambertW(x))) + p.save(os.path.join(tmpdir, filename)) + + #Characteristic function of a StudentT distribution with nu=10 + x1 = 5 * x**2 * exp_polar(-I*pi)/2 + m1 = meijerg(((1 / 2,), ()), ((5, 0, 1 / 2), ()), x1) + x2 = 5*x**2 * exp_polar(I*pi)/2 + m2 = meijerg(((1/2,), ()), ((5, 0, 1/2), ()), x2) + expr = (m1 + m2) / (48 * pi) + with warns( + UserWarning, + match="The evaluation with NumPy/SciPy failed", + test_stacklevel=False, + ): + p = plot(expr, (x, 1e-6, 1e-2), adaptive=adaptive, n=10) + p.save(os.path.join(tmpdir, filename)) + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plotgrid_and_save(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + + with TemporaryDirectory(prefix='sympy_') as tmpdir: + p1 = plot(x, adaptive=adaptive, n=10) + p2 = plot_parametric((sin(x), cos(x)), (x, sin(x)), show=False, + adaptive=adaptive, n=10) + p3 = plot_parametric( + cos(x), sin(x), adaptive=adaptive, n=10, show=False) + p4 = plot3d_parametric_line(sin(x), cos(x), x, show=False, + adaptive=adaptive, n=10) + # symmetric grid + p = PlotGrid(2, 2, p1, p2, p3, p4) + filename = 'test_grid1.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + # grid size greater than the number of subplots + p = PlotGrid(3, 4, p1, p2, p3, p4) + filename = 'test_grid2.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + p5 = plot(cos(x),(x, -pi, pi), show=False, adaptive=adaptive, n=10) + p5[0].line_color = lambda a: a + p6 = plot(Piecewise((1, x > 0), (0, True)), (x, -1, 1), show=False, + adaptive=adaptive, n=10) + p7 = plot_contour( + (x**2 + y**2, (x, -5, 5), (y, -5, 5)), + (x**3 + y**3, (x, -3, 3), (y, -3, 3)), show=False, + adaptive=adaptive, n=10) + # unsymmetric grid (subplots in one line) + p = PlotGrid(1, 3, p5, p6, p7) + filename = 'test_grid3.png' + p.save(os.path.join(tmpdir, filename)) + p._backend.close() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_append_issue_7140(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p1 = plot(x, adaptive=adaptive, n=10) + p2 = plot(x**2, adaptive=adaptive, n=10) + plot(x + 2, adaptive=adaptive, n=10) + + # append a series + p2.append(p1[0]) + assert len(p2._series) == 2 + + with raises(TypeError): + p1.append(p2) + + with raises(TypeError): + p1.append(p2._series) + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_15265(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + eqn = sin(x) + + p = plot(eqn, xlim=(-S.Pi, S.Pi), ylim=(-1, 1), adaptive=adaptive, n=10) + p._backend.close() + + p = plot(eqn, xlim=(-1, 1), ylim=(-S.Pi, S.Pi), adaptive=adaptive, n=10) + p._backend.close() + + p = plot(eqn, xlim=(-1, 1), adaptive=adaptive, n=10, + ylim=(sympify('-3.14'), sympify('3.14'))) + p._backend.close() + + p = plot(eqn, adaptive=adaptive, n=10, + xlim=(sympify('-3.14'), sympify('3.14')), ylim=(-1, 1)) + p._backend.close() + + raises(ValueError, + lambda: plot(eqn, adaptive=adaptive, n=10, + xlim=(-S.ImaginaryUnit, 1), ylim=(-1, 1))) + + raises(ValueError, + lambda: plot(eqn, adaptive=adaptive, n=10, + xlim=(-1, 1), ylim=(-1, S.ImaginaryUnit))) + + raises(ValueError, + lambda: plot(eqn, adaptive=adaptive, n=10, + xlim=(S.NegativeInfinity, 1), ylim=(-1, 1))) + + raises(ValueError, + lambda: plot(eqn, adaptive=adaptive, n=10, + xlim=(-1, 1), ylim=(-1, S.Infinity))) + + +def test_empty_Plot(): + if not matplotlib: + skip("Matplotlib not the default backend") + + # No exception showing an empty plot + plot() + # Plot is only a base class: doesn't implement any logic for showing + # images + p = Plot() + raises(NotImplementedError, lambda: p.show()) + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_17405(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + f = x**0.3 - 10*x**3 + x**2 + p = plot(f, (x, -10, 10), adaptive=adaptive, n=30, show=False) + # Random number of segments, probably more than 100, but we want to see + # that there are segments generated, as opposed to when the bug was present + + # RuntimeWarning: invalid value encountered in double_scalars + with ignore_warnings(RuntimeWarning): + assert len(p[0].get_data()[0]) >= 30 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_logplot_PR_16796(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot(x, (x, .001, 100), adaptive=adaptive, n=30, + xscale='log', show=False) + # Random number of segments, probably more than 100, but we want to see + # that there are segments generated, as opposed to when the bug was present + assert len(p[0].get_data()[0]) >= 30 + assert p[0].end == 100.0 + assert p[0].start == .001 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_16572(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot(LambertW(x), show=False, adaptive=adaptive, n=30) + # Random number of segments, probably more than 50, but we want to see + # that there are segments generated, as opposed to when the bug was present + assert len(p[0].get_data()[0]) >= 30 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_11865(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + k = Symbol('k', integer=True) + f = Piecewise((-I*exp(I*pi*k)/k + I*exp(-I*pi*k)/k, Ne(k, 0)), (2*pi, True)) + p = plot(f, show=False, adaptive=adaptive, n=30) + # Random number of segments, probably more than 100, but we want to see + # that there are segments generated, as opposed to when the bug was present + # and that there are no exceptions. + assert len(p[0].get_data()[0]) >= 30 + + +@skip_under_pyodide("Warnings not emitted in Pyodide because of lack of WASM fp exception support") +def test_issue_11461(): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot(real_root((log(x/(x-2))), 3), show=False, adaptive=True) + with warns( + RuntimeWarning, + match="invalid value encountered in", + test_stacklevel=False, + ): + # Random number of segments, probably more than 100, but we want to see + # that there are segments generated, as opposed to when the bug was present + # and that there are no exceptions. + assert len(p[0].get_data()[0]) >= 30 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_11764(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot_parametric(cos(x), sin(x), (x, 0, 2 * pi), + aspect_ratio=(1,1), show=False, adaptive=adaptive, n=30) + assert p.aspect_ratio == (1, 1) + # Random number of segments, probably more than 100, but we want to see + # that there are segments generated, as opposed to when the bug was present + assert len(p[0].get_data()[0]) >= 30 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_issue_13516(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + + pm = plot(sin(x), backend="matplotlib", show=False, adaptive=adaptive, n=30) + assert pm.backend == MatplotlibBackend + assert len(pm[0].get_data()[0]) >= 30 + + pt = plot(sin(x), backend="text", show=False, adaptive=adaptive, n=30) + assert pt.backend == TextBackend + assert len(pt[0].get_data()[0]) >= 30 + + pd = plot(sin(x), backend="default", show=False, adaptive=adaptive, n=30) + assert pd.backend == MatplotlibBackend + assert len(pd[0].get_data()[0]) >= 30 + + p = plot(sin(x), show=False, adaptive=adaptive, n=30) + assert p.backend == MatplotlibBackend + assert len(p[0].get_data()[0]) >= 30 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_limits(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot(x, x**2, (x, -10, 10), adaptive=adaptive, n=10) + backend = p._backend + + xmin, xmax = backend.ax.get_xlim() + assert abs(xmin + 10) < 2 + assert abs(xmax - 10) < 2 + ymin, ymax = backend.ax.get_ylim() + assert abs(ymin + 10) < 10 + assert abs(ymax - 100) < 10 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot3d_parametric_line_limits(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + + v1 = (2*cos(x), 2*sin(x), 2*x, (x, -5, 5)) + v2 = (sin(x), cos(x), x, (x, -5, 5)) + p = plot3d_parametric_line(v1, v2, adaptive=adaptive, n=60) + backend = p._backend + + xmin, xmax = backend.ax.get_xlim() + assert abs(xmin + 2) < 1e-2 + assert abs(xmax - 2) < 1e-2 + ymin, ymax = backend.ax.get_ylim() + assert abs(ymin + 2) < 1e-2 + assert abs(ymax - 2) < 1e-2 + zmin, zmax = backend.ax.get_zlim() + assert abs(zmin + 10) < 1e-2 + assert abs(zmax - 10) < 1e-2 + + p = plot3d_parametric_line(v2, v1, adaptive=adaptive, n=60) + backend = p._backend + + xmin, xmax = backend.ax.get_xlim() + assert abs(xmin + 2) < 1e-2 + assert abs(xmax - 2) < 1e-2 + ymin, ymax = backend.ax.get_ylim() + assert abs(ymin + 2) < 1e-2 + assert abs(ymax - 2) < 1e-2 + zmin, zmax = backend.ax.get_zlim() + assert abs(zmin + 10) < 1e-2 + assert abs(zmax - 10) < 1e-2 + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_plot_size(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + + p1 = plot(sin(x), backend="matplotlib", size=(8, 4), + adaptive=adaptive, n=10) + s1 = p1._backend.fig.get_size_inches() + assert (s1[0] == 8) and (s1[1] == 4) + p2 = plot(sin(x), backend="matplotlib", size=(5, 10), + adaptive=adaptive, n=10) + s2 = p2._backend.fig.get_size_inches() + assert (s2[0] == 5) and (s2[1] == 10) + p3 = PlotGrid(2, 1, p1, p2, size=(6, 2), + adaptive=adaptive, n=10) + s3 = p3._backend.fig.get_size_inches() + assert (s3[0] == 6) and (s3[1] == 2) + + with raises(ValueError): + plot(sin(x), backend="matplotlib", size=(-1, 3)) + + +def test_issue_20113(): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + + # verify the capability to use custom backends + plot(sin(x), backend=Plot, show=False) + p2 = plot(sin(x), backend=MatplotlibBackend, show=False) + assert p2.backend == MatplotlibBackend + assert len(p2[0].get_data()[0]) >= 30 + p3 = plot(sin(x), backend=DummyBackendOk, show=False) + assert p3.backend == DummyBackendOk + assert len(p3[0].get_data()[0]) >= 30 + + # test for an improper coded backend + p4 = plot(sin(x), backend=DummyBackendNotOk, show=False) + assert p4.backend == DummyBackendNotOk + assert len(p4[0].get_data()[0]) >= 30 + with raises(NotImplementedError): + p4.show() + with raises(NotImplementedError): + p4.save("test/path") + with raises(NotImplementedError): + p4._backend.close() + + +def test_custom_coloring(): + x = Symbol('x') + y = Symbol('y') + plot(cos(x), line_color=lambda a: a) + plot(cos(x), line_color=1) + plot(cos(x), line_color="r") + plot_parametric(cos(x), sin(x), line_color=lambda a: a) + plot_parametric(cos(x), sin(x), line_color=1) + plot_parametric(cos(x), sin(x), line_color="r") + plot3d_parametric_line(cos(x), sin(x), x, line_color=lambda a: a) + plot3d_parametric_line(cos(x), sin(x), x, line_color=1) + plot3d_parametric_line(cos(x), sin(x), x, line_color="r") + plot3d_parametric_surface(cos(x + y), sin(x - y), x - y, + (x, -5, 5), (y, -5, 5), + surface_color=lambda a, b: a**2 + b**2) + plot3d_parametric_surface(cos(x + y), sin(x - y), x - y, + (x, -5, 5), (y, -5, 5), + surface_color=1) + plot3d_parametric_surface(cos(x + y), sin(x - y), x - y, + (x, -5, 5), (y, -5, 5), + surface_color="r") + plot3d(x*y, (x, -5, 5), (y, -5, 5), + surface_color=lambda a, b: a**2 + b**2) + plot3d(x*y, (x, -5, 5), (y, -5, 5), surface_color=1) + plot3d(x*y, (x, -5, 5), (y, -5, 5), surface_color="r") + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_deprecated_get_segments(adaptive): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + f = sin(x) + p = plot(f, (x, -10, 10), show=False, adaptive=adaptive, n=10) + with warns_deprecated_sympy(): + p[0].get_segments() + + +@pytest.mark.parametrize("adaptive", [True, False]) +def test_generic_data_series(adaptive): + # verify that no errors are raised when generic data series are used + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol("x") + p = plot(x, + markers=[{"args":[[0, 1], [0, 1]], "marker": "*", "linestyle": "none"}], + annotations=[{"text": "test", "xy": (0, 0)}], + fill={"x": [0, 1, 2, 3], "y1": [0, 1, 2, 3]}, + rectangles=[{"xy": (0, 0), "width": 5, "height": 1}], + adaptive=adaptive, n=10) + assert len(p._backend.ax.collections) == 1 + assert len(p._backend.ax.patches) == 1 + assert len(p._backend.ax.lines) == 2 + assert len(p._backend.ax.texts) == 1 + + +def test_deprecated_markers_annotations_rectangles_fill(): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + p = plot(sin(x), (x, -10, 10), show=False) + with warns_deprecated_sympy(): + p.markers = [{"args":[[0, 1], [0, 1]], "marker": "*", "linestyle": "none"}] + assert len(p._series) == 2 + with warns_deprecated_sympy(): + p.annotations = [{"text": "test", "xy": (0, 0)}] + assert len(p._series) == 3 + with warns_deprecated_sympy(): + p.fill = {"x": [0, 1, 2, 3], "y1": [0, 1, 2, 3]} + assert len(p._series) == 4 + with warns_deprecated_sympy(): + p.rectangles = [{"xy": (0, 0), "width": 5, "height": 1}] + assert len(p._series) == 5 + + +def test_back_compatibility(): + if not matplotlib: + skip("Matplotlib not the default backend") + + x = Symbol('x') + y = Symbol('y') + p = plot(sin(x), adaptive=False, n=5) + assert len(p[0].get_points()) == 2 + assert len(p[0].get_data()) == 2 + p = plot_parametric(cos(x), sin(x), (x, 0, 2), adaptive=False, n=5) + assert len(p[0].get_points()) == 2 + assert len(p[0].get_data()) == 3 + p = plot3d_parametric_line(cos(x), sin(x), x, (x, 0, 2), + adaptive=False, n=5) + assert len(p[0].get_points()) == 3 + assert len(p[0].get_data()) == 4 + p = plot3d(cos(x**2 + y**2), (x, -pi, pi), (y, -pi, pi), n=5) + assert len(p[0].get_meshes()) == 3 + assert len(p[0].get_data()) == 3 + p = plot_contour(cos(x**2 + y**2), (x, -pi, pi), (y, -pi, pi), n=5) + assert len(p[0].get_meshes()) == 3 + assert len(p[0].get_data()) == 3 + p = plot3d_parametric_surface(x * cos(y), x * sin(y), x * cos(4 * y) / 2, + (x, 0, pi), (y, 0, 2*pi), n=5) + assert len(p[0].get_meshes()) == 3 + assert len(p[0].get_data()) == 5 + + +def test_plot_arguments(): + ### Test arguments for plot() + if not matplotlib: + skip("Matplotlib not the default backend") + + x, y = symbols("x, y") + + # single expressions + p = plot(x + 1) + assert isinstance(p[0], LineOver1DRangeSeries) + assert p[0].expr == x + 1 + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x + 1" + assert p[0].rendering_kw == {} + + # single expressions custom label + p = plot(x + 1, "label") + assert isinstance(p[0], LineOver1DRangeSeries) + assert p[0].expr == x + 1 + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "label" + assert p[0].rendering_kw == {} + + # single expressions with range + p = plot(x + 1, (x, -2, 2)) + assert p[0].ranges == [(x, -2, 2)] + + # single expressions with range, label and rendering-kw dictionary + p = plot(x + 1, (x, -2, 2), "test", {"color": "r"}) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {"color": "r"} + + # multiple expressions + p = plot(x + 1, x**2) + assert isinstance(p[0], LineOver1DRangeSeries) + assert p[0].expr == x + 1 + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x + 1" + assert p[0].rendering_kw == {} + assert isinstance(p[1], LineOver1DRangeSeries) + assert p[1].expr == x**2 + assert p[1].ranges == [(x, -10, 10)] + assert p[1].get_label(False) == "x**2" + assert p[1].rendering_kw == {} + + # multiple expressions over the same range + p = plot(x + 1, x**2, (x, 0, 5)) + assert p[0].ranges == [(x, 0, 5)] + assert p[1].ranges == [(x, 0, 5)] + + # multiple expressions over the same range with the same rendering kws + p = plot(x + 1, x**2, (x, 0, 5), {"color": "r"}) + assert p[0].ranges == [(x, 0, 5)] + assert p[1].ranges == [(x, 0, 5)] + assert p[0].rendering_kw == {"color": "r"} + assert p[1].rendering_kw == {"color": "r"} + + # multiple expressions with different ranges, labels and rendering kws + p = plot( + (x + 1, (x, 0, 5)), + (x**2, (x, -2, 2), "test", {"color": "r"})) + assert isinstance(p[0], LineOver1DRangeSeries) + assert p[0].expr == x + 1 + assert p[0].ranges == [(x, 0, 5)] + assert p[0].get_label(False) == "x + 1" + assert p[0].rendering_kw == {} + assert isinstance(p[1], LineOver1DRangeSeries) + assert p[1].expr == x**2 + assert p[1].ranges == [(x, -2, 2)] + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {"color": "r"} + + # single argument: lambda function + f = lambda t: t + p = plot(lambda t: t) + assert isinstance(p[0], LineOver1DRangeSeries) + assert callable(p[0].expr) + assert p[0].ranges[0][1:] == (-10, 10) + assert p[0].get_label(False) == "" + assert p[0].rendering_kw == {} + + # single argument: lambda function + custom range and label + p = plot(f, ("t", -5, 6), "test") + assert p[0].ranges[0][1:] == (-5, 6) + assert p[0].get_label(False) == "test" + + +def test_plot_parametric_arguments(): + ### Test arguments for plot_parametric() + if not matplotlib: + skip("Matplotlib not the default backend") + + x, y = symbols("x, y") + + # single parametric expression + p = plot_parametric(x + 1, x) + assert isinstance(p[0], Parametric2DLineSeries) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + + # single parametric expression with custom range, label and rendering kws + p = plot_parametric(x + 1, x, (x, -2, 2), "test", + {"cmap": "Reds"}) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {"cmap": "Reds"} + + p = plot_parametric((x + 1, x), (x, -2, 2), "test") + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + + # multiple parametric expressions same symbol + p = plot_parametric((x + 1, x), (x ** 2, x + 1)) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (x ** 2, x + 1) + assert p[1].ranges == [(x, -10, 10)] + assert p[1].get_label(False) == "x" + assert p[1].rendering_kw == {} + + # multiple parametric expressions different symbols + p = plot_parametric((x + 1, x), (y ** 2, y + 1, "test")) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (y ** 2, y + 1) + assert p[1].ranges == [(y, -10, 10)] + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {} + + # multiple parametric expressions same range + p = plot_parametric((x + 1, x), (x ** 2, x + 1), (x, -2, 2)) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (x ** 2, x + 1) + assert p[1].ranges == [(x, -2, 2)] + assert p[1].get_label(False) == "x" + assert p[1].rendering_kw == {} + + # multiple parametric expressions, custom ranges and labels + p = plot_parametric( + (x + 1, x, (x, -2, 2), "test1"), + (x ** 2, x + 1, (x, -3, 3), "test2", {"cmap": "Reds"})) + assert p[0].expr == (x + 1, x) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "test1" + assert p[0].rendering_kw == {} + assert p[1].expr == (x ** 2, x + 1) + assert p[1].ranges == [(x, -3, 3)] + assert p[1].get_label(False) == "test2" + assert p[1].rendering_kw == {"cmap": "Reds"} + + # single argument: lambda function + fx = lambda t: t + fy = lambda t: 2 * t + p = plot_parametric(fx, fy) + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (-10, 10) + assert "Dummy" in p[0].get_label(False) + assert p[0].rendering_kw == {} + + # single argument: lambda function + custom range + label + p = plot_parametric(fx, fy, ("t", 0, 2), "test") + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (0, 2) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + + +def test_plot3d_parametric_line_arguments(): + ### Test arguments for plot3d_parametric_line() + if not matplotlib: + skip("Matplotlib not the default backend") + + x, y = symbols("x, y") + + # single parametric expression + p = plot3d_parametric_line(x + 1, x, sin(x)) + assert isinstance(p[0], Parametric3DLineSeries) + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + + # single parametric expression with custom range, label and rendering kws + p = plot3d_parametric_line(x + 1, x, sin(x), (x, -2, 2), + "test", {"cmap": "Reds"}) + assert isinstance(p[0], Parametric3DLineSeries) + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {"cmap": "Reds"} + + p = plot3d_parametric_line((x + 1, x, sin(x)), (x, -2, 2), "test") + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -2, 2)] + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + + # multiple parametric expression same symbol + p = plot3d_parametric_line( + (x + 1, x, sin(x)), (x ** 2, 1, cos(x), {"cmap": "Reds"})) + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (x ** 2, 1, cos(x)) + assert p[1].ranges == [(x, -10, 10)] + assert p[1].get_label(False) == "x" + assert p[1].rendering_kw == {"cmap": "Reds"} + + # multiple parametric expression different symbols + p = plot3d_parametric_line((x + 1, x, sin(x)), (y ** 2, 1, cos(y))) + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (y ** 2, 1, cos(y)) + assert p[1].ranges == [(y, -10, 10)] + assert p[1].get_label(False) == "y" + assert p[1].rendering_kw == {} + + # multiple parametric expression, custom ranges and labels + p = plot3d_parametric_line( + (x + 1, x, sin(x)), + (x ** 2, 1, cos(x), (x, -2, 2), "test", {"cmap": "Reds"})) + assert p[0].expr == (x + 1, x, sin(x)) + assert p[0].ranges == [(x, -10, 10)] + assert p[0].get_label(False) == "x" + assert p[0].rendering_kw == {} + assert p[1].expr == (x ** 2, 1, cos(x)) + assert p[1].ranges == [(x, -2, 2)] + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {"cmap": "Reds"} + + # single argument: lambda function + fx = lambda t: t + fy = lambda t: 2 * t + fz = lambda t: 3 * t + p = plot3d_parametric_line(fx, fy, fz) + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (-10, 10) + assert "Dummy" in p[0].get_label(False) + assert p[0].rendering_kw == {} + + # single argument: lambda function + custom range + label + p = plot3d_parametric_line(fx, fy, fz, ("t", 0, 2), "test") + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (0, 2) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + + +def test_plot3d_plot_contour_arguments(): + ### Test arguments for plot3d() and plot_contour() + if not matplotlib: + skip("Matplotlib not the default backend") + + x, y = symbols("x, y") + + # single expression + p = plot3d(x + y) + assert isinstance(p[0], SurfaceOver2DRangeSeries) + assert p[0].expr == x + y + assert p[0].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[0].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[0].get_label(False) == "x + y" + assert p[0].rendering_kw == {} + + # single expression, custom range, label and rendering kws + p = plot3d(x + y, (x, -2, 2), "test", {"cmap": "Reds"}) + assert isinstance(p[0], SurfaceOver2DRangeSeries) + assert p[0].expr == x + y + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -10, 10) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {"cmap": "Reds"} + + p = plot3d(x + y, (x, -2, 2), (y, -4, 4), "test") + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -4, 4) + + # multiple expressions + p = plot3d(x + y, x * y) + assert p[0].expr == x + y + assert p[0].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[0].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[0].get_label(False) == "x + y" + assert p[0].rendering_kw == {} + assert p[1].expr == x * y + assert p[1].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[1].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[1].get_label(False) == "x*y" + assert p[1].rendering_kw == {} + + # multiple expressions, same custom ranges + p = plot3d(x + y, x * y, (x, -2, 2), (y, -4, 4)) + assert p[0].expr == x + y + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -4, 4) + assert p[0].get_label(False) == "x + y" + assert p[0].rendering_kw == {} + assert p[1].expr == x * y + assert p[1].ranges[0] == (x, -2, 2) + assert p[1].ranges[1] == (y, -4, 4) + assert p[1].get_label(False) == "x*y" + assert p[1].rendering_kw == {} + + # multiple expressions, custom ranges, labels and rendering kws + p = plot3d( + (x + y, (x, -2, 2), (y, -4, 4)), + (x * y, (x, -3, 3), (y, -6, 6), "test", {"cmap": "Reds"})) + assert p[0].expr == x + y + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -4, 4) + assert p[0].get_label(False) == "x + y" + assert p[0].rendering_kw == {} + assert p[1].expr == x * y + assert p[1].ranges[0] == (x, -3, 3) + assert p[1].ranges[1] == (y, -6, 6) + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {"cmap": "Reds"} + + # single expression: lambda function + f = lambda x, y: x + y + p = plot3d(f) + assert callable(p[0].expr) + assert p[0].ranges[0][1:] == (-10, 10) + assert p[0].ranges[1][1:] == (-10, 10) + assert p[0].get_label(False) == "" + assert p[0].rendering_kw == {} + + # single expression: lambda function + custom ranges + label + p = plot3d(f, ("a", -5, 3), ("b", -2, 1), "test") + assert callable(p[0].expr) + assert p[0].ranges[0][1:] == (-5, 3) + assert p[0].ranges[1][1:] == (-2, 1) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + + # test issue 25818 + # single expression, custom range, min/max functions + p = plot3d(Min(x, y), (x, 0, 10), (y, 0, 10)) + assert isinstance(p[0], SurfaceOver2DRangeSeries) + assert p[0].expr == Min(x, y) + assert p[0].ranges[0] == (x, 0, 10) + assert p[0].ranges[1] == (y, 0, 10) + assert p[0].get_label(False) == "Min(x, y)" + assert p[0].rendering_kw == {} + + +def test_plot3d_parametric_surface_arguments(): + ### Test arguments for plot3d_parametric_surface() + if not matplotlib: + skip("Matplotlib not the default backend") + + x, y = symbols("x, y") + + # single parametric expression + p = plot3d_parametric_surface(x + y, cos(x + y), sin(x + y)) + assert isinstance(p[0], ParametricSurfaceSeries) + assert p[0].expr == (x + y, cos(x + y), sin(x + y)) + assert p[0].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[0].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[0].get_label(False) == "(x + y, cos(x + y), sin(x + y))" + assert p[0].rendering_kw == {} + + # single parametric expression, custom ranges, labels and rendering kws + p = plot3d_parametric_surface(x + y, cos(x + y), sin(x + y), + (x, -2, 2), (y, -4, 4), "test", {"cmap": "Reds"}) + assert isinstance(p[0], ParametricSurfaceSeries) + assert p[0].expr == (x + y, cos(x + y), sin(x + y)) + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -4, 4) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {"cmap": "Reds"} + + # multiple parametric expressions + p = plot3d_parametric_surface( + (x + y, cos(x + y), sin(x + y)), + (x - y, cos(x - y), sin(x - y), "test")) + assert p[0].expr == (x + y, cos(x + y), sin(x + y)) + assert p[0].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[0].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[0].get_label(False) == "(x + y, cos(x + y), sin(x + y))" + assert p[0].rendering_kw == {} + assert p[1].expr == (x - y, cos(x - y), sin(x - y)) + assert p[1].ranges[0] == (x, -10, 10) or (y, -10, 10) + assert p[1].ranges[1] == (x, -10, 10) or (y, -10, 10) + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {} + + # multiple parametric expressions, custom ranges and labels + p = plot3d_parametric_surface( + (x + y, cos(x + y), sin(x + y), (x, -2, 2), "test"), + (x - y, cos(x - y), sin(x - y), (x, -3, 3), (y, -4, 4), + "test2", {"cmap": "Reds"})) + assert p[0].expr == (x + y, cos(x + y), sin(x + y)) + assert p[0].ranges[0] == (x, -2, 2) + assert p[0].ranges[1] == (y, -10, 10) + assert p[0].get_label(False) == "test" + assert p[0].rendering_kw == {} + assert p[1].expr == (x - y, cos(x - y), sin(x - y)) + assert p[1].ranges[0] == (x, -3, 3) + assert p[1].ranges[1] == (y, -4, 4) + assert p[1].get_label(False) == "test2" + assert p[1].rendering_kw == {"cmap": "Reds"} + + # lambda functions instead of symbolic expressions for a single 3D + # parametric surface + p = plot3d_parametric_surface( + lambda u, v: u, lambda u, v: v, lambda u, v: u + v, + ("u", 0, 2), ("v", -3, 4)) + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (-0, 2) + assert p[0].ranges[1][1:] == (-3, 4) + assert p[0].get_label(False) == "" + assert p[0].rendering_kw == {} + + # lambda functions instead of symbolic expressions for multiple 3D + # parametric surfaces + p = plot3d_parametric_surface( + (lambda u, v: u, lambda u, v: v, lambda u, v: u + v, + ("u", 0, 2), ("v", -3, 4)), + (lambda u, v: v, lambda u, v: u, lambda u, v: u - v, + ("u", -2, 3), ("v", -4, 5), "test")) + assert all(callable(t) for t in p[0].expr) + assert p[0].ranges[0][1:] == (0, 2) + assert p[0].ranges[1][1:] == (-3, 4) + assert p[0].get_label(False) == "" + assert p[0].rendering_kw == {} + assert all(callable(t) for t in p[1].expr) + assert p[1].ranges[0][1:] == (-2, 3) + assert p[1].ranges[1][1:] == (-4, 5) + assert p[1].get_label(False) == "test" + assert p[1].rendering_kw == {} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot_implicit.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot_implicit.py new file mode 100644 index 0000000000000000000000000000000000000000..73c7b186c83f0b64d5f6f4cc5cd9f6a08efef43a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_plot_implicit.py @@ -0,0 +1,146 @@ +from sympy.core.numbers import (I, pi) +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import re +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import (cos, sin, tan) +from sympy.logic.boolalg import (And, Or) +from sympy.plotting.plot_implicit import plot_implicit +from sympy.plotting.plot import unset_show +from tempfile import NamedTemporaryFile, mkdtemp +from sympy.testing.pytest import skip, warns, XFAIL +from sympy.external import import_module +from sympy.testing.tmpfiles import TmpFileManager + +import os + +#Set plots not to show +unset_show() + +def tmp_file(dir=None, name=''): + return NamedTemporaryFile( + suffix='.png', dir=dir, delete=False).name + +def plot_and_save(expr, *args, name='', dir=None, **kwargs): + p = plot_implicit(expr, *args, **kwargs) + p.save(tmp_file(dir=dir, name=name)) + # Close the plot to avoid a warning from matplotlib + p._backend.close() + +def plot_implicit_tests(name): + temp_dir = mkdtemp() + TmpFileManager.tmp_folder(temp_dir) + x = Symbol('x') + y = Symbol('y') + #implicit plot tests + plot_and_save(Eq(y, cos(x)), (x, -5, 5), (y, -2, 2), name=name, dir=temp_dir) + plot_and_save(Eq(y**2, x**3 - x), (x, -5, 5), + (y, -4, 4), name=name, dir=temp_dir) + plot_and_save(y > 1 / x, (x, -5, 5), + (y, -2, 2), name=name, dir=temp_dir) + plot_and_save(y < 1 / tan(x), (x, -5, 5), + (y, -2, 2), name=name, dir=temp_dir) + plot_and_save(y >= 2 * sin(x) * cos(x), (x, -5, 5), + (y, -2, 2), name=name, dir=temp_dir) + plot_and_save(y <= x**2, (x, -3, 3), + (y, -1, 5), name=name, dir=temp_dir) + + #Test all input args for plot_implicit + plot_and_save(Eq(y**2, x**3 - x), dir=temp_dir) + plot_and_save(Eq(y**2, x**3 - x), adaptive=False, dir=temp_dir) + plot_and_save(Eq(y**2, x**3 - x), adaptive=False, n=500, dir=temp_dir) + plot_and_save(y > x, (x, -5, 5), dir=temp_dir) + plot_and_save(And(y > exp(x), y > x + 2), dir=temp_dir) + plot_and_save(Or(y > x, y > -x), dir=temp_dir) + plot_and_save(x**2 - 1, (x, -5, 5), dir=temp_dir) + plot_and_save(x**2 - 1, dir=temp_dir) + plot_and_save(y > x, depth=-5, dir=temp_dir) + plot_and_save(y > x, depth=5, dir=temp_dir) + plot_and_save(y > cos(x), adaptive=False, dir=temp_dir) + plot_and_save(y < cos(x), adaptive=False, dir=temp_dir) + plot_and_save(And(y > cos(x), Or(y > x, Eq(y, x))), dir=temp_dir) + plot_and_save(y - cos(pi / x), dir=temp_dir) + + plot_and_save(x**2 - 1, title='An implicit plot', dir=temp_dir) + +@XFAIL +def test_no_adaptive_meshing(): + matplotlib = import_module('matplotlib', min_module_version='1.1.0', catch=(RuntimeError,)) + if matplotlib: + try: + temp_dir = mkdtemp() + TmpFileManager.tmp_folder(temp_dir) + x = Symbol('x') + y = Symbol('y') + # Test plots which cannot be rendered using the adaptive algorithm + + # This works, but it triggers a deprecation warning from sympify(). The + # code needs to be updated to detect if interval math is supported without + # relying on random AttributeErrors. + with warns(UserWarning, match="Adaptive meshing could not be applied"): + plot_and_save(Eq(y, re(cos(x) + I*sin(x))), name='test', dir=temp_dir) + finally: + TmpFileManager.cleanup() + else: + skip("Matplotlib not the default backend") +def test_line_color(): + x, y = symbols('x, y') + p = plot_implicit(x**2 + y**2 - 1, line_color="green", show=False) + assert p._series[0].line_color == "green" + p = plot_implicit(x**2 + y**2 - 1, line_color='r', show=False) + assert p._series[0].line_color == "r" + +def test_matplotlib(): + matplotlib = import_module('matplotlib', min_module_version='1.1.0', catch=(RuntimeError,)) + if matplotlib: + try: + plot_implicit_tests('test') + test_line_color() + finally: + TmpFileManager.cleanup() + else: + skip("Matplotlib not the default backend") + + +def test_region_and(): + matplotlib = import_module('matplotlib', min_module_version='1.1.0', catch=(RuntimeError,)) + if not matplotlib: + skip("Matplotlib not the default backend") + + from matplotlib.testing.compare import compare_images + test_directory = os.path.dirname(os.path.abspath(__file__)) + + try: + temp_dir = mkdtemp() + TmpFileManager.tmp_folder(temp_dir) + + x, y = symbols('x y') + + r1 = (x - 1)**2 + y**2 < 2 + r2 = (x + 1)**2 + y**2 < 2 + + test_filename = tmp_file(dir=temp_dir, name="test_region_and") + cmp_filename = os.path.join(test_directory, "test_region_and.png") + p = plot_implicit(r1 & r2, x, y) + p.save(test_filename) + compare_images(cmp_filename, test_filename, 0.005) + + test_filename = tmp_file(dir=temp_dir, name="test_region_or") + cmp_filename = os.path.join(test_directory, "test_region_or.png") + p = plot_implicit(r1 | r2, x, y) + p.save(test_filename) + compare_images(cmp_filename, test_filename, 0.005) + + test_filename = tmp_file(dir=temp_dir, name="test_region_not") + cmp_filename = os.path.join(test_directory, "test_region_not.png") + p = plot_implicit(~r1, x, y) + p.save(test_filename) + compare_images(cmp_filename, test_filename, 0.005) + + test_filename = tmp_file(dir=temp_dir, name="test_region_xor") + cmp_filename = os.path.join(test_directory, "test_region_xor.png") + p = plot_implicit(r1 ^ r2, x, y) + p.save(test_filename) + compare_images(cmp_filename, test_filename, 0.005) + finally: + TmpFileManager.cleanup() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_series.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_series.py new file mode 100644 index 0000000000000000000000000000000000000000..9fdacbd73aef18b07d2e14ce444b709654ee6f23 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_series.py @@ -0,0 +1,1771 @@ +from sympy import ( + latex, exp, symbols, I, pi, sin, cos, tan, log, sqrt, + re, im, arg, frac, Sum, S, Abs, lambdify, + Function, dsolve, Eq, floor, Tuple +) +from sympy.external import import_module +from sympy.plotting.series import ( + LineOver1DRangeSeries, Parametric2DLineSeries, Parametric3DLineSeries, + SurfaceOver2DRangeSeries, ContourSeries, ParametricSurfaceSeries, + ImplicitSeries, _set_discretization_points, List2DSeries +) +from sympy.testing.pytest import raises, warns, XFAIL, skip, ignore_warnings + +np = import_module('numpy') + + +def test_adaptive(): + # verify that adaptive-related keywords produces the expected results + if not np: + skip("numpy not installed.") + + x, y = symbols("x, y") + + s1 = LineOver1DRangeSeries(sin(x), (x, -10, 10), "", adaptive=True, + depth=2) + x1, _ = s1.get_data() + s2 = LineOver1DRangeSeries(sin(x), (x, -10, 10), "", adaptive=True, + depth=5) + x2, _ = s2.get_data() + s3 = LineOver1DRangeSeries(sin(x), (x, -10, 10), "", adaptive=True) + x3, _ = s3.get_data() + assert len(x1) < len(x2) < len(x3) + + s1 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=True, depth=2) + x1, _, _, = s1.get_data() + s2 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=True, depth=5) + x2, _, _ = s2.get_data() + s3 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=True) + x3, _, _ = s3.get_data() + assert len(x1) < len(x2) < len(x3) + + +def test_detect_poles(): + if not np: + skip("numpy not installed.") + + x, u = symbols("x, u") + + s1 = LineOver1DRangeSeries(tan(x), (x, -pi, pi), + adaptive=False, n=1000, detect_poles=False) + xx1, yy1 = s1.get_data() + s2 = LineOver1DRangeSeries(tan(x), (x, -pi, pi), + adaptive=False, n=1000, detect_poles=True, eps=0.01) + xx2, yy2 = s2.get_data() + # eps is too small: doesn't detect any poles + s3 = LineOver1DRangeSeries(tan(x), (x, -pi, pi), + adaptive=False, n=1000, detect_poles=True, eps=1e-06) + xx3, yy3 = s3.get_data() + s4 = LineOver1DRangeSeries(tan(x), (x, -pi, pi), + adaptive=False, n=1000, detect_poles="symbolic") + xx4, yy4 = s4.get_data() + + assert np.allclose(xx1, xx2) and np.allclose(xx1, xx3) and np.allclose(xx1, xx4) + assert not np.any(np.isnan(yy1)) + assert not np.any(np.isnan(yy3)) + assert np.any(np.isnan(yy2)) + assert np.any(np.isnan(yy4)) + assert len(s2.poles_locations) == len(s3.poles_locations) == 0 + assert len(s4.poles_locations) == 2 + assert np.allclose(np.abs(s4.poles_locations), np.pi / 2) + + with warns( + UserWarning, + match="NumPy is unable to evaluate with complex numbers some of", + test_stacklevel=False, + ): + s1 = LineOver1DRangeSeries(frac(x), (x, -10, 10), + adaptive=False, n=1000, detect_poles=False) + s2 = LineOver1DRangeSeries(frac(x), (x, -10, 10), + adaptive=False, n=1000, detect_poles=True, eps=0.05) + s3 = LineOver1DRangeSeries(frac(x), (x, -10, 10), + adaptive=False, n=1000, detect_poles="symbolic") + xx1, yy1 = s1.get_data() + xx2, yy2 = s2.get_data() + xx3, yy3 = s3.get_data() + assert np.allclose(xx1, xx2) and np.allclose(xx1, xx3) + assert not np.any(np.isnan(yy1)) + assert np.any(np.isnan(yy2)) and np.any(np.isnan(yy2)) + assert not np.allclose(yy1, yy2, equal_nan=True) + # The poles below are actually step discontinuities. + assert len(s3.poles_locations) == 21 + + s1 = LineOver1DRangeSeries(tan(u * x), (x, -pi, pi), params={u: 1}, + adaptive=False, n=1000, detect_poles=False) + xx1, yy1 = s1.get_data() + s2 = LineOver1DRangeSeries(tan(u * x), (x, -pi, pi), params={u: 1}, + adaptive=False, n=1000, detect_poles=True, eps=0.01) + xx2, yy2 = s2.get_data() + # eps is too small: doesn't detect any poles + s3 = LineOver1DRangeSeries(tan(u * x), (x, -pi, pi), params={u: 1}, + adaptive=False, n=1000, detect_poles=True, eps=1e-06) + xx3, yy3 = s3.get_data() + s4 = LineOver1DRangeSeries(tan(u * x), (x, -pi, pi), params={u: 1}, + adaptive=False, n=1000, detect_poles="symbolic") + xx4, yy4 = s4.get_data() + + assert np.allclose(xx1, xx2) and np.allclose(xx1, xx3) and np.allclose(xx1, xx4) + assert not np.any(np.isnan(yy1)) + assert not np.any(np.isnan(yy3)) + assert np.any(np.isnan(yy2)) + assert np.any(np.isnan(yy4)) + assert len(s2.poles_locations) == len(s3.poles_locations) == 0 + assert len(s4.poles_locations) == 2 + assert np.allclose(np.abs(s4.poles_locations), np.pi / 2) + + with warns( + UserWarning, + match="NumPy is unable to evaluate with complex numbers some of", + test_stacklevel=False, + ): + u, v = symbols("u, v", real=True) + n = S(1) / 3 + f = (u + I * v)**n + r, i = re(f), im(f) + s1 = Parametric2DLineSeries(r.subs(u, -2), i.subs(u, -2), (v, -2, 2), + adaptive=False, n=1000, detect_poles=False) + s2 = Parametric2DLineSeries(r.subs(u, -2), i.subs(u, -2), (v, -2, 2), + adaptive=False, n=1000, detect_poles=True) + with ignore_warnings(RuntimeWarning): + xx1, yy1, pp1 = s1.get_data() + assert not np.isnan(yy1).any() + xx2, yy2, pp2 = s2.get_data() + assert np.isnan(yy2).any() + + with warns( + UserWarning, + match="NumPy is unable to evaluate with complex numbers some of", + test_stacklevel=False, + ): + f = (x * u + x * I * v)**n + r, i = re(f), im(f) + s1 = Parametric2DLineSeries(r.subs(u, -2), i.subs(u, -2), + (v, -2, 2), params={x: 1}, + adaptive=False, n1=1000, detect_poles=False) + s2 = Parametric2DLineSeries(r.subs(u, -2), i.subs(u, -2), + (v, -2, 2), params={x: 1}, + adaptive=False, n1=1000, detect_poles=True) + with ignore_warnings(RuntimeWarning): + xx1, yy1, pp1 = s1.get_data() + assert not np.isnan(yy1).any() + xx2, yy2, pp2 = s2.get_data() + assert np.isnan(yy2).any() + + +def test_number_discretization_points(): + # verify that the different ways to set the number of discretization + # points are consistent with each other. + if not np: + skip("numpy not installed.") + + x, y, z = symbols("x:z") + + for pt in [LineOver1DRangeSeries, Parametric2DLineSeries, + Parametric3DLineSeries]: + kw1 = _set_discretization_points({"n": 10}, pt) + kw2 = _set_discretization_points({"n": [10, 20, 30]}, pt) + kw3 = _set_discretization_points({"n1": 10}, pt) + assert all(("n1" in kw) and kw["n1"] == 10 for kw in [kw1, kw2, kw3]) + + for pt in [SurfaceOver2DRangeSeries, ContourSeries, ParametricSurfaceSeries, + ImplicitSeries]: + kw1 = _set_discretization_points({"n": 10}, pt) + kw2 = _set_discretization_points({"n": [10, 20, 30]}, pt) + kw3 = _set_discretization_points({"n1": 10, "n2": 20}, pt) + assert kw1["n1"] == kw1["n2"] == 10 + assert all((kw["n1"] == 10) and (kw["n2"] == 20) for kw in [kw2, kw3]) + + # verify that line-related series can deal with large float number of + # discretization points + LineOver1DRangeSeries(cos(x), (x, -5, 5), adaptive=False, n=1e04).get_data() + + +def test_list2dseries(): + if not np: + skip("numpy not installed.") + + xx = np.linspace(-3, 3, 10) + yy1 = np.cos(xx) + yy2 = np.linspace(-3, 3, 20) + + # same number of elements: everything is fine + s = List2DSeries(xx, yy1) + assert not s.is_parametric + # different number of elements: error + raises(ValueError, lambda: List2DSeries(xx, yy2)) + + # no color func: returns only x, y components and s in not parametric + s = List2DSeries(xx, yy1) + xxs, yys = s.get_data() + assert np.allclose(xx, xxs) + assert np.allclose(yy1, yys) + assert not s.is_parametric + + +def test_interactive_vs_noninteractive(): + # verify that if a *Series class receives a `params` dictionary, it sets + # is_interactive=True + x, y, z, u, v = symbols("x, y, z, u, v") + + s = LineOver1DRangeSeries(cos(x), (x, -5, 5)) + assert not s.is_interactive + s = LineOver1DRangeSeries(u * cos(x), (x, -5, 5), params={u: 1}) + assert s.is_interactive + + s = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5)) + assert not s.is_interactive + s = Parametric2DLineSeries(u * cos(x), u * sin(x), (x, -5, 5), + params={u: 1}) + assert s.is_interactive + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5)) + assert not s.is_interactive + s = Parametric3DLineSeries(u * cos(x), u * sin(x), x, (x, -5, 5), + params={u: 1}) + assert s.is_interactive + + s = SurfaceOver2DRangeSeries(cos(x * y), (x, -5, 5), (y, -5, 5)) + assert not s.is_interactive + s = SurfaceOver2DRangeSeries(u * cos(x * y), (x, -5, 5), (y, -5, 5), + params={u: 1}) + assert s.is_interactive + + s = ContourSeries(cos(x * y), (x, -5, 5), (y, -5, 5)) + assert not s.is_interactive + s = ContourSeries(u * cos(x * y), (x, -5, 5), (y, -5, 5), + params={u: 1}) + assert s.is_interactive + + s = ParametricSurfaceSeries(u * cos(v), v * sin(u), u + v, + (u, -5, 5), (v, -5, 5)) + assert not s.is_interactive + s = ParametricSurfaceSeries(u * cos(v * x), v * sin(u), u + v, + (u, -5, 5), (v, -5, 5), params={x: 1}) + assert s.is_interactive + + +def test_lin_log_scale(): + # Verify that data series create the correct spacing in the data. + if not np: + skip("numpy not installed.") + + x, y, z = symbols("x, y, z") + + s = LineOver1DRangeSeries(x, (x, 1, 10), adaptive=False, n=50, + xscale="linear") + xx, _ = s.get_data() + assert np.isclose(xx[1] - xx[0], xx[-1] - xx[-2]) + + s = LineOver1DRangeSeries(x, (x, 1, 10), adaptive=False, n=50, + xscale="log") + xx, _ = s.get_data() + assert not np.isclose(xx[1] - xx[0], xx[-1] - xx[-2]) + + s = Parametric2DLineSeries( + cos(x), sin(x), (x, pi / 2, 1.5 * pi), adaptive=False, n=50, + xscale="linear") + _, _, param = s.get_data() + assert np.isclose(param[1] - param[0], param[-1] - param[-2]) + + s = Parametric2DLineSeries( + cos(x), sin(x), (x, pi / 2, 1.5 * pi), adaptive=False, n=50, + xscale="log") + _, _, param = s.get_data() + assert not np.isclose(param[1] - param[0], param[-1] - param[-2]) + + s = Parametric3DLineSeries( + cos(x), sin(x), x, (x, pi / 2, 1.5 * pi), adaptive=False, n=50, + xscale="linear") + _, _, _, param = s.get_data() + assert np.isclose(param[1] - param[0], param[-1] - param[-2]) + + s = Parametric3DLineSeries( + cos(x), sin(x), x, (x, pi / 2, 1.5 * pi), adaptive=False, n=50, + xscale="log") + _, _, _, param = s.get_data() + assert not np.isclose(param[1] - param[0], param[-1] - param[-2]) + + s = SurfaceOver2DRangeSeries( + cos(x ** 2 + y ** 2), (x, 1, 5), (y, 1, 5), n=10, + xscale="linear", yscale="linear") + xx, yy, _ = s.get_data() + assert np.isclose(xx[0, 1] - xx[0, 0], xx[0, -1] - xx[0, -2]) + assert np.isclose(yy[1, 0] - yy[0, 0], yy[-1, 0] - yy[-2, 0]) + + s = SurfaceOver2DRangeSeries( + cos(x ** 2 + y ** 2), (x, 1, 5), (y, 1, 5), n=10, + xscale="log", yscale="log") + xx, yy, _ = s.get_data() + assert not np.isclose(xx[0, 1] - xx[0, 0], xx[0, -1] - xx[0, -2]) + assert not np.isclose(yy[1, 0] - yy[0, 0], yy[-1, 0] - yy[-2, 0]) + + s = ImplicitSeries( + cos(x ** 2 + y ** 2) > 0, (x, 1, 5), (y, 1, 5), + n1=10, n2=10, xscale="linear", yscale="linear", adaptive=False) + xx, yy, _, _ = s.get_data() + assert np.isclose(xx[0, 1] - xx[0, 0], xx[0, -1] - xx[0, -2]) + assert np.isclose(yy[1, 0] - yy[0, 0], yy[-1, 0] - yy[-2, 0]) + + s = ImplicitSeries( + cos(x ** 2 + y ** 2) > 0, (x, 1, 5), (y, 1, 5), + n=10, xscale="log", yscale="log", adaptive=False) + xx, yy, _, _ = s.get_data() + assert not np.isclose(xx[0, 1] - xx[0, 0], xx[0, -1] - xx[0, -2]) + assert not np.isclose(yy[1, 0] - yy[0, 0], yy[-1, 0] - yy[-2, 0]) + + +def test_rendering_kw(): + # verify that each series exposes the `rendering_kw` attribute + if not np: + skip("numpy not installed.") + + u, v, x, y, z = symbols("u, v, x:z") + + s = List2DSeries([1, 2, 3], [4, 5, 6]) + assert isinstance(s.rendering_kw, dict) + + s = LineOver1DRangeSeries(1, (x, -5, 5)) + assert isinstance(s.rendering_kw, dict) + + s = Parametric2DLineSeries(sin(x), cos(x), (x, 0, pi)) + assert isinstance(s.rendering_kw, dict) + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2 * pi)) + assert isinstance(s.rendering_kw, dict) + + s = SurfaceOver2DRangeSeries(x + y, (x, -2, 2), (y, -3, 3)) + assert isinstance(s.rendering_kw, dict) + + s = ContourSeries(x + y, (x, -2, 2), (y, -3, 3)) + assert isinstance(s.rendering_kw, dict) + + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1)) + assert isinstance(s.rendering_kw, dict) + + +def test_data_shape(): + # Verify that the series produces the correct data shape when the input + # expression is a number. + if not np: + skip("numpy not installed.") + + u, x, y, z = symbols("u, x:z") + + # scalar expression: it should return a numpy ones array + s = LineOver1DRangeSeries(1, (x, -5, 5)) + xx, yy = s.get_data() + assert len(xx) == len(yy) + assert np.all(yy == 1) + + s = LineOver1DRangeSeries(1, (x, -5, 5), adaptive=False, n=10) + xx, yy = s.get_data() + assert len(xx) == len(yy) == 10 + assert np.all(yy == 1) + + s = Parametric2DLineSeries(sin(x), 1, (x, 0, pi)) + xx, yy, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(param)) + assert np.all(yy == 1) + + s = Parametric2DLineSeries(1, sin(x), (x, 0, pi)) + xx, yy, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(param)) + assert np.all(xx == 1) + + s = Parametric2DLineSeries(sin(x), 1, (x, 0, pi), adaptive=False) + xx, yy, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(param)) + assert np.all(yy == 1) + + s = Parametric2DLineSeries(1, sin(x), (x, 0, pi), adaptive=False) + xx, yy, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(param)) + assert np.all(xx == 1) + + s = Parametric3DLineSeries(cos(x), sin(x), 1, (x, 0, 2 * pi)) + xx, yy, zz, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(zz)) and (len(xx) == len(param)) + assert np.all(zz == 1) + + s = Parametric3DLineSeries(cos(x), 1, x, (x, 0, 2 * pi)) + xx, yy, zz, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(zz)) and (len(xx) == len(param)) + assert np.all(yy == 1) + + s = Parametric3DLineSeries(1, sin(x), x, (x, 0, 2 * pi)) + xx, yy, zz, param = s.get_data() + assert (len(xx) == len(yy)) and (len(xx) == len(zz)) and (len(xx) == len(param)) + assert np.all(xx == 1) + + s = SurfaceOver2DRangeSeries(1, (x, -2, 2), (y, -3, 3)) + xx, yy, zz = s.get_data() + assert (xx.shape == yy.shape) and (xx.shape == zz.shape) + assert np.all(zz == 1) + + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1)) + xx, yy, zz, uu, vv = s.get_data() + assert xx.shape == yy.shape == zz.shape == uu.shape == vv.shape + assert np.all(xx == 1) + + s = ParametricSurfaceSeries(1, 1, y, (x, 0, 1), (y, 0, 1)) + xx, yy, zz, uu, vv = s.get_data() + assert xx.shape == yy.shape == zz.shape == uu.shape == vv.shape + assert np.all(yy == 1) + + s = ParametricSurfaceSeries(x, 1, 1, (x, 0, 1), (y, 0, 1)) + xx, yy, zz, uu, vv = s.get_data() + assert xx.shape == yy.shape == zz.shape == uu.shape == vv.shape + assert np.all(zz == 1) + + +def test_only_integers(): + if not np: + skip("numpy not installed.") + + x, y, u, v = symbols("x, y, u, v") + + s = LineOver1DRangeSeries(sin(x), (x, -5.5, 4.5), "", + adaptive=False, only_integers=True) + xx, _ = s.get_data() + assert len(xx) == 10 + assert xx[0] == -5 and xx[-1] == 4 + + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2 * pi), "", + adaptive=False, only_integers=True) + _, _, p = s.get_data() + assert len(p) == 7 + assert p[0] == 0 and p[-1] == 6 + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2 * pi), "", + adaptive=False, only_integers=True) + _, _, _, p = s.get_data() + assert len(p) == 7 + assert p[0] == 0 and p[-1] == 6 + + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -5.5, 5.5), + (y, -3.5, 3.5), "", + adaptive=False, only_integers=True) + xx, yy, _ = s.get_data() + assert xx.shape == yy.shape == (7, 11) + assert np.allclose(xx[:, 0] - (-5) * np.ones(7), 0) + assert np.allclose(xx[0, :] - np.linspace(-5, 5, 11), 0) + assert np.allclose(yy[:, 0] - np.linspace(-3, 3, 7), 0) + assert np.allclose(yy[0, :] - (-3) * np.ones(11), 0) + + r = 2 + sin(7 * u + 5 * v) + expr = ( + r * cos(u) * sin(v), + r * sin(u) * sin(v), + r * cos(v) + ) + s = ParametricSurfaceSeries(*expr, (u, 0, 2 * pi), (v, 0, pi), "", + adaptive=False, only_integers=True) + xx, yy, zz, uu, vv = s.get_data() + assert xx.shape == yy.shape == zz.shape == uu.shape == vv.shape == (4, 7) + + # only_integers also works with scalar expressions + s = LineOver1DRangeSeries(1, (x, -5.5, 4.5), "", + adaptive=False, only_integers=True) + xx, _ = s.get_data() + assert len(xx) == 10 + assert xx[0] == -5 and xx[-1] == 4 + + s = Parametric2DLineSeries(cos(x), 1, (x, 0, 2 * pi), "", + adaptive=False, only_integers=True) + _, _, p = s.get_data() + assert len(p) == 7 + assert p[0] == 0 and p[-1] == 6 + + s = SurfaceOver2DRangeSeries(1, (x, -5.5, 5.5), (y, -3.5, 3.5), "", + adaptive=False, only_integers=True) + xx, yy, _ = s.get_data() + assert xx.shape == yy.shape == (7, 11) + assert np.allclose(xx[:, 0] - (-5) * np.ones(7), 0) + assert np.allclose(xx[0, :] - np.linspace(-5, 5, 11), 0) + assert np.allclose(yy[:, 0] - np.linspace(-3, 3, 7), 0) + assert np.allclose(yy[0, :] - (-3) * np.ones(11), 0) + + r = 2 + sin(7 * u + 5 * v) + expr = ( + r * cos(u) * sin(v), + 1, + r * cos(v) + ) + s = ParametricSurfaceSeries(*expr, (u, 0, 2 * pi), (v, 0, pi), "", + adaptive=False, only_integers=True) + xx, yy, zz, uu, vv = s.get_data() + assert xx.shape == yy.shape == zz.shape == uu.shape == vv.shape == (4, 7) + + +def test_is_point_is_filled(): + # verify that `is_point` and `is_filled` are attributes and that they + # they receive the correct values + if not np: + skip("numpy not installed.") + + x, u = symbols("x, u") + + s = LineOver1DRangeSeries(cos(x), (x, -5, 5), "", + is_point=False, is_filled=True) + assert (not s.is_point) and s.is_filled + s = LineOver1DRangeSeries(cos(x), (x, -5, 5), "", + is_point=True, is_filled=False) + assert s.is_point and (not s.is_filled) + + s = List2DSeries([0, 1, 2], [3, 4, 5], + is_point=False, is_filled=True) + assert (not s.is_point) and s.is_filled + s = List2DSeries([0, 1, 2], [3, 4, 5], + is_point=True, is_filled=False) + assert s.is_point and (not s.is_filled) + + s = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5), + is_point=False, is_filled=True) + assert (not s.is_point) and s.is_filled + s = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5), + is_point=True, is_filled=False) + assert s.is_point and (not s.is_filled) + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5), + is_point=False, is_filled=True) + assert (not s.is_point) and s.is_filled + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5), + is_point=True, is_filled=False) + assert s.is_point and (not s.is_filled) + + +def test_is_filled_2d(): + # verify that the is_filled attribute is exposed by the following series + x, y = symbols("x, y") + + expr = cos(x**2 + y**2) + ranges = (x, -2, 2), (y, -2, 2) + + s = ContourSeries(expr, *ranges) + assert s.is_filled + s = ContourSeries(expr, *ranges, is_filled=True) + assert s.is_filled + s = ContourSeries(expr, *ranges, is_filled=False) + assert not s.is_filled + + +def test_steps(): + if not np: + skip("numpy not installed.") + + x, u = symbols("x, u") + + def do_test(s1, s2): + if (not s1.is_parametric) and s1.is_2Dline: + xx1, _ = s1.get_data() + xx2, _ = s2.get_data() + elif s1.is_parametric and s1.is_2Dline: + xx1, _, _ = s1.get_data() + xx2, _, _ = s2.get_data() + elif (not s1.is_parametric) and s1.is_3Dline: + xx1, _, _ = s1.get_data() + xx2, _, _ = s2.get_data() + else: + xx1, _, _, _ = s1.get_data() + xx2, _, _, _ = s2.get_data() + assert len(xx1) != len(xx2) + + s1 = LineOver1DRangeSeries(cos(x), (x, -5, 5), "", + adaptive=False, n=40, steps=False) + s2 = LineOver1DRangeSeries(cos(x), (x, -5, 5), "", + adaptive=False, n=40, steps=True) + do_test(s1, s2) + + s1 = List2DSeries([0, 1, 2], [3, 4, 5], steps=False) + s2 = List2DSeries([0, 1, 2], [3, 4, 5], steps=True) + do_test(s1, s2) + + s1 = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5), + adaptive=False, n=40, steps=False) + s2 = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5), + adaptive=False, n=40, steps=True) + do_test(s1, s2) + + s1 = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5), + adaptive=False, n=40, steps=False) + s2 = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5), + adaptive=False, n=40, steps=True) + do_test(s1, s2) + + +def test_interactive_data(): + # verify that InteractiveSeries produces the same numerical data as their + # corresponding non-interactive series. + if not np: + skip("numpy not installed.") + + u, x, y, z = symbols("u, x:z") + + def do_test(data1, data2): + assert len(data1) == len(data2) + for d1, d2 in zip(data1, data2): + assert np.allclose(d1, d2) + + s1 = LineOver1DRangeSeries(u * cos(x), (x, -5, 5), params={u: 1}, n=50) + s2 = LineOver1DRangeSeries(cos(x), (x, -5, 5), adaptive=False, n=50) + do_test(s1.get_data(), s2.get_data()) + + s1 = Parametric2DLineSeries( + u * cos(x), u * sin(x), (x, -5, 5), params={u: 1}, n=50) + s2 = Parametric2DLineSeries(cos(x), sin(x), (x, -5, 5), + adaptive=False, n=50) + do_test(s1.get_data(), s2.get_data()) + + s1 = Parametric3DLineSeries( + u * cos(x), u * sin(x), u * x, (x, -5, 5), + params={u: 1}, n=50) + s2 = Parametric3DLineSeries(cos(x), sin(x), x, (x, -5, 5), + adaptive=False, n=50) + do_test(s1.get_data(), s2.get_data()) + + s1 = SurfaceOver2DRangeSeries( + u * cos(x ** 2 + y ** 2), (x, -3, 3), (y, -3, 3), + params={u: 1}, n1=50, n2=50,) + s2 = SurfaceOver2DRangeSeries( + cos(x ** 2 + y ** 2), (x, -3, 3), (y, -3, 3), + adaptive=False, n1=50, n2=50) + do_test(s1.get_data(), s2.get_data()) + + s1 = ParametricSurfaceSeries( + u * cos(x + y), sin(x + y), x - y, (x, -3, 3), (y, -3, 3), + params={u: 1}, n1=50, n2=50,) + s2 = ParametricSurfaceSeries( + cos(x + y), sin(x + y), x - y, (x, -3, 3), (y, -3, 3), + adaptive=False, n1=50, n2=50,) + do_test(s1.get_data(), s2.get_data()) + + # real part of a complex function evaluated over a real line with numpy + expr = re((z ** 2 + 1) / (z ** 2 - 1)) + s1 = LineOver1DRangeSeries(u * expr, (z, -3, 3), adaptive=False, n=50, + modules=None, params={u: 1}) + s2 = LineOver1DRangeSeries(expr, (z, -3, 3), adaptive=False, n=50, + modules=None) + do_test(s1.get_data(), s2.get_data()) + + # real part of a complex function evaluated over a real line with mpmath + expr = re((z ** 2 + 1) / (z ** 2 - 1)) + s1 = LineOver1DRangeSeries(u * expr, (z, -3, 3), n=50, modules="mpmath", + params={u: 1}) + s2 = LineOver1DRangeSeries(expr, (z, -3, 3), + adaptive=False, n=50, modules="mpmath") + do_test(s1.get_data(), s2.get_data()) + + +def test_list2dseries_interactive(): + if not np: + skip("numpy not installed.") + + x, y, u = symbols("x, y, u") + + s = List2DSeries([1, 2, 3], [1, 2, 3]) + assert not s.is_interactive + + # symbolic expressions as coordinates, but no ``params`` + raises(ValueError, lambda: List2DSeries([cos(x)], [sin(x)])) + + # too few parameters + raises(ValueError, + lambda: List2DSeries([cos(x), y], [sin(x), 2], params={u: 1})) + + s = List2DSeries([cos(x)], [sin(x)], params={x: 1}) + assert s.is_interactive + + s = List2DSeries([x, 2, 3, 4], [4, 3, 2, x], params={x: 3}) + xx, yy = s.get_data() + assert np.allclose(xx, [3, 2, 3, 4]) + assert np.allclose(yy, [4, 3, 2, 3]) + assert not s.is_parametric + + # numeric lists + params is present -> interactive series and + # lists are converted to Tuple. + s = List2DSeries([1, 2, 3], [1, 2, 3], params={x: 1}) + assert s.is_interactive + assert isinstance(s.list_x, Tuple) + assert isinstance(s.list_y, Tuple) + + +def test_mpmath(): + # test that the argument of complex functions evaluated with mpmath + # might be different than the one computed with Numpy (different + # behaviour at branch cuts) + if not np: + skip("numpy not installed.") + + z, u = symbols("z, u") + + s1 = LineOver1DRangeSeries(im(sqrt(-z)), (z, 1e-03, 5), + adaptive=True, modules=None, force_real_eval=True) + s2 = LineOver1DRangeSeries(im(sqrt(-z)), (z, 1e-03, 5), + adaptive=True, modules="mpmath", force_real_eval=True) + xx1, yy1 = s1.get_data() + xx2, yy2 = s2.get_data() + assert np.all(yy1 < 0) + assert np.all(yy2 > 0) + + s1 = LineOver1DRangeSeries(im(sqrt(-z)), (z, -5, 5), + adaptive=False, n=20, modules=None, force_real_eval=True) + s2 = LineOver1DRangeSeries(im(sqrt(-z)), (z, -5, 5), + adaptive=False, n=20, modules="mpmath", force_real_eval=True) + xx1, yy1 = s1.get_data() + xx2, yy2 = s2.get_data() + assert np.allclose(xx1, xx2) + assert not np.allclose(yy1, yy2) + + +def test_str(): + u, x, y, z = symbols("u, x:z") + + s = LineOver1DRangeSeries(cos(x), (x, -4, 3)) + assert str(s) == "cartesian line: cos(x) for x over (-4.0, 3.0)" + + d = {"return": "real"} + s = LineOver1DRangeSeries(cos(x), (x, -4, 3), **d) + assert str(s) == "cartesian line: re(cos(x)) for x over (-4.0, 3.0)" + + d = {"return": "imag"} + s = LineOver1DRangeSeries(cos(x), (x, -4, 3), **d) + assert str(s) == "cartesian line: im(cos(x)) for x over (-4.0, 3.0)" + + d = {"return": "abs"} + s = LineOver1DRangeSeries(cos(x), (x, -4, 3), **d) + assert str(s) == "cartesian line: abs(cos(x)) for x over (-4.0, 3.0)" + + d = {"return": "arg"} + s = LineOver1DRangeSeries(cos(x), (x, -4, 3), **d) + assert str(s) == "cartesian line: arg(cos(x)) for x over (-4.0, 3.0)" + + s = LineOver1DRangeSeries(cos(u * x), (x, -4, 3), params={u: 1}) + assert str(s) == "interactive cartesian line: cos(u*x) for x over (-4.0, 3.0) and parameters (u,)" + + s = LineOver1DRangeSeries(cos(u * x), (x, -u, 3*y), params={u: 1, y: 1}) + assert str(s) == "interactive cartesian line: cos(u*x) for x over (-u, 3*y) and parameters (u, y)" + + s = Parametric2DLineSeries(cos(x), sin(x), (x, -4, 3)) + assert str(s) == "parametric cartesian line: (cos(x), sin(x)) for x over (-4.0, 3.0)" + + s = Parametric2DLineSeries(cos(u * x), sin(x), (x, -4, 3), params={u: 1}) + assert str(s) == "interactive parametric cartesian line: (cos(u*x), sin(x)) for x over (-4.0, 3.0) and parameters (u,)" + + s = Parametric2DLineSeries(cos(u * x), sin(x), (x, -u, 3*y), params={u: 1, y:1}) + assert str(s) == "interactive parametric cartesian line: (cos(u*x), sin(x)) for x over (-u, 3*y) and parameters (u, y)" + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -4, 3)) + assert str(s) == "3D parametric cartesian line: (cos(x), sin(x), x) for x over (-4.0, 3.0)" + + s = Parametric3DLineSeries(cos(u*x), sin(x), x, (x, -4, 3), params={u: 1}) + assert str(s) == "interactive 3D parametric cartesian line: (cos(u*x), sin(x), x) for x over (-4.0, 3.0) and parameters (u,)" + + s = Parametric3DLineSeries(cos(u*x), sin(x), x, (x, -u, 3*y), params={u: 1, y: 1}) + assert str(s) == "interactive 3D parametric cartesian line: (cos(u*x), sin(x), x) for x over (-u, 3*y) and parameters (u, y)" + + s = SurfaceOver2DRangeSeries(cos(x * y), (x, -4, 3), (y, -2, 5)) + assert str(s) == "cartesian surface: cos(x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0)" + + s = SurfaceOver2DRangeSeries(cos(u * x * y), (x, -4, 3), (y, -2, 5), params={u: 1}) + assert str(s) == "interactive cartesian surface: cos(u*x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0) and parameters (u,)" + + s = SurfaceOver2DRangeSeries(cos(u * x * y), (x, -4*u, 3), (y, -2, 5*u), params={u: 1}) + assert str(s) == "interactive cartesian surface: cos(u*x*y) for x over (-4*u, 3.0) and y over (-2.0, 5*u) and parameters (u,)" + + s = ContourSeries(cos(x * y), (x, -4, 3), (y, -2, 5)) + assert str(s) == "contour: cos(x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0)" + + s = ContourSeries(cos(u * x * y), (x, -4, 3), (y, -2, 5), params={u: 1}) + assert str(s) == "interactive contour: cos(u*x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0) and parameters (u,)" + + s = ParametricSurfaceSeries(cos(x * y), sin(x * y), x * y, + (x, -4, 3), (y, -2, 5)) + assert str(s) == "parametric cartesian surface: (cos(x*y), sin(x*y), x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0)" + + s = ParametricSurfaceSeries(cos(u * x * y), sin(x * y), x * y, + (x, -4, 3), (y, -2, 5), params={u: 1}) + assert str(s) == "interactive parametric cartesian surface: (cos(u*x*y), sin(x*y), x*y) for x over (-4.0, 3.0) and y over (-2.0, 5.0) and parameters (u,)" + + s = ImplicitSeries(x < y, (x, -5, 4), (y, -3, 2)) + assert str(s) == "Implicit expression: x < y for x over (-5.0, 4.0) and y over (-3.0, 2.0)" + + +def test_use_cm(): + # verify that the `use_cm` attribute is implemented. + if not np: + skip("numpy not installed.") + + u, x, y, z = symbols("u, x:z") + + s = List2DSeries([1, 2, 3, 4], [5, 6, 7, 8], use_cm=True) + assert s.use_cm + s = List2DSeries([1, 2, 3, 4], [5, 6, 7, 8], use_cm=False) + assert not s.use_cm + + s = Parametric2DLineSeries(cos(x), sin(x), (x, -4, 3), use_cm=True) + assert s.use_cm + s = Parametric2DLineSeries(cos(x), sin(x), (x, -4, 3), use_cm=False) + assert not s.use_cm + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -4, 3), + use_cm=True) + assert s.use_cm + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, -4, 3), + use_cm=False) + assert not s.use_cm + + s = SurfaceOver2DRangeSeries(cos(x * y), (x, -4, 3), (y, -2, 5), + use_cm=True) + assert s.use_cm + s = SurfaceOver2DRangeSeries(cos(x * y), (x, -4, 3), (y, -2, 5), + use_cm=False) + assert not s.use_cm + + s = ParametricSurfaceSeries(cos(x * y), sin(x * y), x * y, + (x, -4, 3), (y, -2, 5), use_cm=True) + assert s.use_cm + s = ParametricSurfaceSeries(cos(x * y), sin(x * y), x * y, + (x, -4, 3), (y, -2, 5), use_cm=False) + assert not s.use_cm + + +def test_surface_use_cm(): + # verify that SurfaceOver2DRangeSeries and ParametricSurfaceSeries get + # the same value for use_cm + + x, y, u, v = symbols("x, y, u, v") + + # they read the same value from default settings + s1 = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2)) + s2 = ParametricSurfaceSeries(u * cos(v), u * sin(v), u, + (u, 0, 1), (v, 0 , 2*pi)) + assert s1.use_cm == s2.use_cm + + # they get the same value + s1 = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + use_cm=False) + s2 = ParametricSurfaceSeries(u * cos(v), u * sin(v), u, + (u, 0, 1), (v, 0 , 2*pi), use_cm=False) + assert s1.use_cm == s2.use_cm + + # they get the same value + s1 = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + use_cm=True) + s2 = ParametricSurfaceSeries(u * cos(v), u * sin(v), u, + (u, 0, 1), (v, 0 , 2*pi), use_cm=True) + assert s1.use_cm == s2.use_cm + + +def test_sums(): + # test that data series are able to deal with sums + if not np: + skip("numpy not installed.") + + x, y, u = symbols("x, y, u") + + def do_test(data1, data2): + assert len(data1) == len(data2) + for d1, d2 in zip(data1, data2): + assert np.allclose(d1, d2) + + s = LineOver1DRangeSeries(Sum(1 / x ** y, (x, 1, 1000)), (y, 2, 10), + adaptive=False, only_integers=True) + xx, yy = s.get_data() + + s1 = LineOver1DRangeSeries(Sum(1 / x, (x, 1, y)), (y, 2, 10), + adaptive=False, only_integers=True) + xx1, yy1 = s1.get_data() + + s2 = LineOver1DRangeSeries(Sum(u / x, (x, 1, y)), (y, 2, 10), + params={u: 1}, only_integers=True) + xx2, yy2 = s2.get_data() + xx1 = xx1.astype(float) + xx2 = xx2.astype(float) + do_test([xx1, yy1], [xx2, yy2]) + + s = LineOver1DRangeSeries(Sum(1 / x, (x, 1, y)), (y, 2, 10), + adaptive=True) + with warns( + UserWarning, + match="The evaluation with NumPy/SciPy failed", + test_stacklevel=False, + ): + raises(TypeError, lambda: s.get_data()) + + +def test_apply_transforms(): + # verify that transformation functions get applied to the output + # of data series + if not np: + skip("numpy not installed.") + + x, y, z, u, v = symbols("x:z, u, v") + + s1 = LineOver1DRangeSeries(cos(x), (x, -2*pi, 2*pi), adaptive=False, n=10) + s2 = LineOver1DRangeSeries(cos(x), (x, -2*pi, 2*pi), adaptive=False, n=10, + tx=np.rad2deg) + s3 = LineOver1DRangeSeries(cos(x), (x, -2*pi, 2*pi), adaptive=False, n=10, + ty=np.rad2deg) + s4 = LineOver1DRangeSeries(cos(x), (x, -2*pi, 2*pi), adaptive=False, n=10, + tx=np.rad2deg, ty=np.rad2deg) + + x1, y1 = s1.get_data() + x2, y2 = s2.get_data() + x3, y3 = s3.get_data() + x4, y4 = s4.get_data() + assert np.isclose(x1[0], -2*np.pi) and np.isclose(x1[-1], 2*np.pi) + assert (y1.min() < -0.9) and (y1.max() > 0.9) + assert np.isclose(x2[0], -360) and np.isclose(x2[-1], 360) + assert (y2.min() < -0.9) and (y2.max() > 0.9) + assert np.isclose(x3[0], -2*np.pi) and np.isclose(x3[-1], 2*np.pi) + assert (y3.min() < -52) and (y3.max() > 52) + assert np.isclose(x4[0], -360) and np.isclose(x4[-1], 360) + assert (y4.min() < -52) and (y4.max() > 52) + + xx = np.linspace(-2*np.pi, 2*np.pi, 10) + yy = np.cos(xx) + s1 = List2DSeries(xx, yy) + s2 = List2DSeries(xx, yy, tx=np.rad2deg, ty=np.rad2deg) + x1, y1 = s1.get_data() + x2, y2 = s2.get_data() + assert np.isclose(x1[0], -2*np.pi) and np.isclose(x1[-1], 2*np.pi) + assert (y1.min() < -0.9) and (y1.max() > 0.9) + assert np.isclose(x2[0], -360) and np.isclose(x2[-1], 360) + assert (y2.min() < -52) and (y2.max() > 52) + + s1 = Parametric2DLineSeries( + sin(x), cos(x), (x, -pi, pi), adaptive=False, n=10) + s2 = Parametric2DLineSeries( + sin(x), cos(x), (x, -pi, pi), adaptive=False, n=10, + tx=np.rad2deg, ty=np.rad2deg, tp=np.rad2deg) + x1, y1, a1 = s1.get_data() + x2, y2, a2 = s2.get_data() + assert np.allclose(x1, np.deg2rad(x2)) + assert np.allclose(y1, np.deg2rad(y2)) + assert np.allclose(a1, np.deg2rad(a2)) + + s1 = Parametric3DLineSeries( + sin(x), cos(x), x, (x, -pi, pi), adaptive=False, n=10) + s2 = Parametric3DLineSeries( + sin(x), cos(x), x, (x, -pi, pi), adaptive=False, n=10, tp=np.rad2deg) + x1, y1, z1, a1 = s1.get_data() + x2, y2, z2, a2 = s2.get_data() + assert np.allclose(x1, x2) + assert np.allclose(y1, y2) + assert np.allclose(z1, z2) + assert np.allclose(a1, np.deg2rad(a2)) + + s1 = SurfaceOver2DRangeSeries( + cos(x**2 + y**2), (x, -2*pi, 2*pi), (y, -2*pi, 2*pi), + adaptive=False, n1=10, n2=10) + s2 = SurfaceOver2DRangeSeries( + cos(x**2 + y**2), (x, -2*pi, 2*pi), (y, -2*pi, 2*pi), + adaptive=False, n1=10, n2=10, + tx=np.rad2deg, ty=lambda x: 2*x, tz=lambda x: 3*x) + x1, y1, z1 = s1.get_data() + x2, y2, z2 = s2.get_data() + assert np.allclose(x1, np.deg2rad(x2)) + assert np.allclose(y1, y2 / 2) + assert np.allclose(z1, z2 / 3) + + s1 = ParametricSurfaceSeries( + u + v, u - v, u * v, (u, 0, 2*pi), (v, 0, pi), + adaptive=False, n1=10, n2=10) + s2 = ParametricSurfaceSeries( + u + v, u - v, u * v, (u, 0, 2*pi), (v, 0, pi), + adaptive=False, n1=10, n2=10, + tx=np.rad2deg, ty=lambda x: 2*x, tz=lambda x: 3*x) + x1, y1, z1, u1, v1 = s1.get_data() + x2, y2, z2, u2, v2 = s2.get_data() + assert np.allclose(x1, np.deg2rad(x2)) + assert np.allclose(y1, y2 / 2) + assert np.allclose(z1, z2 / 3) + assert np.allclose(u1, u2) + assert np.allclose(v1, v2) + + +def test_series_labels(): + # verify that series return the correct label, depending on the plot + # type and input arguments. If the user set custom label on a data series, + # it should returned un-modified. + if not np: + skip("numpy not installed.") + + x, y, z, u, v = symbols("x, y, z, u, v") + wrapper = "$%s$" + + expr = cos(x) + s1 = LineOver1DRangeSeries(expr, (x, -2, 2), None) + s2 = LineOver1DRangeSeries(expr, (x, -2, 2), "test") + assert s1.get_label(False) == str(expr) + assert s1.get_label(True) == wrapper % latex(expr) + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + + s1 = List2DSeries([0, 1, 2, 3], [0, 1, 2, 3], "test") + assert s1.get_label(False) == "test" + assert s1.get_label(True) == "test" + + expr = (cos(x), sin(x)) + s1 = Parametric2DLineSeries(*expr, (x, -2, 2), None, use_cm=True) + s2 = Parametric2DLineSeries(*expr, (x, -2, 2), "test", use_cm=True) + s3 = Parametric2DLineSeries(*expr, (x, -2, 2), None, use_cm=False) + s4 = Parametric2DLineSeries(*expr, (x, -2, 2), "test", use_cm=False) + assert s1.get_label(False) == "x" + assert s1.get_label(True) == wrapper % "x" + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + assert s3.get_label(False) == str(expr) + assert s3.get_label(True) == wrapper % latex(expr) + assert s4.get_label(False) == "test" + assert s4.get_label(True) == "test" + + expr = (cos(x), sin(x), x) + s1 = Parametric3DLineSeries(*expr, (x, -2, 2), None, use_cm=True) + s2 = Parametric3DLineSeries(*expr, (x, -2, 2), "test", use_cm=True) + s3 = Parametric3DLineSeries(*expr, (x, -2, 2), None, use_cm=False) + s4 = Parametric3DLineSeries(*expr, (x, -2, 2), "test", use_cm=False) + assert s1.get_label(False) == "x" + assert s1.get_label(True) == wrapper % "x" + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + assert s3.get_label(False) == str(expr) + assert s3.get_label(True) == wrapper % latex(expr) + assert s4.get_label(False) == "test" + assert s4.get_label(True) == "test" + + expr = cos(x**2 + y**2) + s1 = SurfaceOver2DRangeSeries(expr, (x, -2, 2), (y, -2, 2), None) + s2 = SurfaceOver2DRangeSeries(expr, (x, -2, 2), (y, -2, 2), "test") + assert s1.get_label(False) == str(expr) + assert s1.get_label(True) == wrapper % latex(expr) + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + + expr = (cos(x - y), sin(x + y), x - y) + s1 = ParametricSurfaceSeries(*expr, (x, -2, 2), (y, -2, 2), None) + s2 = ParametricSurfaceSeries(*expr, (x, -2, 2), (y, -2, 2), "test") + assert s1.get_label(False) == str(expr) + assert s1.get_label(True) == wrapper % latex(expr) + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + + expr = Eq(cos(x - y), 0) + s1 = ImplicitSeries(expr, (x, -10, 10), (y, -10, 10), None) + s2 = ImplicitSeries(expr, (x, -10, 10), (y, -10, 10), "test") + assert s1.get_label(False) == str(expr) + assert s1.get_label(True) == wrapper % latex(expr) + assert s2.get_label(False) == "test" + assert s2.get_label(True) == "test" + + +def test_is_polar_2d_parametric(): + # verify that Parametric2DLineSeries isable to apply polar discretization, + # which is used when polar_plot is executed with polar_axis=True + if not np: + skip("numpy not installed.") + + t, u = symbols("t u") + + # NOTE: a sufficiently big n must be provided, or else tests + # are going to fail + # No colormap + f = sin(4 * t) + s1 = Parametric2DLineSeries(f * cos(t), f * sin(t), (t, 0, 2*pi), + adaptive=False, n=10, is_polar=False, use_cm=False) + x1, y1, p1 = s1.get_data() + s2 = Parametric2DLineSeries(f * cos(t), f * sin(t), (t, 0, 2*pi), + adaptive=False, n=10, is_polar=True, use_cm=False) + th, r, p2 = s2.get_data() + assert (not np.allclose(x1, th)) and (not np.allclose(y1, r)) + assert np.allclose(p1, p2) + + # With colormap + s3 = Parametric2DLineSeries(f * cos(t), f * sin(t), (t, 0, 2*pi), + adaptive=False, n=10, is_polar=False, color_func=lambda t: 2*t) + x3, y3, p3 = s3.get_data() + s4 = Parametric2DLineSeries(f * cos(t), f * sin(t), (t, 0, 2*pi), + adaptive=False, n=10, is_polar=True, color_func=lambda t: 2*t) + th4, r4, p4 = s4.get_data() + assert np.allclose(p3, p4) and (not np.allclose(p1, p3)) + assert np.allclose(x3, x1) and np.allclose(y3, y1) + assert np.allclose(th4, th) and np.allclose(r4, r) + + +def test_is_polar_3d(): + # verify that SurfaceOver2DRangeSeries is able to apply + # polar discretization + if not np: + skip("numpy not installed.") + + x, y, t = symbols("x, y, t") + expr = (x**2 - 1)**2 + s1 = SurfaceOver2DRangeSeries(expr, (x, 0, 1.5), (y, 0, 2 * pi), + n=10, adaptive=False, is_polar=False) + s2 = SurfaceOver2DRangeSeries(expr, (x, 0, 1.5), (y, 0, 2 * pi), + n=10, adaptive=False, is_polar=True) + x1, y1, z1 = s1.get_data() + x2, y2, z2 = s2.get_data() + x22, y22 = x1 * np.cos(y1), x1 * np.sin(y1) + assert np.allclose(x2, x22) + assert np.allclose(y2, y22) + + +def test_color_func(): + # verify that eval_color_func produces the expected results in order to + # maintain back compatibility with the old sympy.plotting module + if not np: + skip("numpy not installed.") + + x, y, z, u, v = symbols("x, y, z, u, v") + + # color func: returns x, y, color and s is parametric + xx = np.linspace(-3, 3, 10) + yy1 = np.cos(xx) + s = List2DSeries(xx, yy1, color_func=lambda x, y: 2 * x, use_cm=True) + xxs, yys, col = s.get_data() + assert np.allclose(xx, xxs) + assert np.allclose(yy1, yys) + assert np.allclose(2 * xx, col) + assert s.is_parametric + + s = List2DSeries(xx, yy1, color_func=lambda x, y: 2 * x, use_cm=False) + assert len(s.get_data()) == 2 + assert not s.is_parametric + + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda t: t) + xx, yy, col = s.get_data() + assert (not np.allclose(xx, col)) and (not np.allclose(yy, col)) + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda x, y: x * y) + xx, yy, col = s.get_data() + assert np.allclose(col, xx * yy) + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda x, y, t: x * y * t) + xx, yy, col = s.get_data() + assert np.allclose(col, xx * yy * np.linspace(0, 2*np.pi, 10)) + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda t: t) + xx, yy, zz, col = s.get_data() + assert (not np.allclose(xx, col)) and (not np.allclose(yy, col)) + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda x, y, z: x * y * z) + xx, yy, zz, col = s.get_data() + assert np.allclose(col, xx * yy * zz) + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda x, y, z, t: x * y * z * t) + xx, yy, zz, col = s.get_data() + assert np.allclose(col, xx * yy * zz * np.linspace(0, 2*np.pi, 10)) + + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + adaptive=False, n1=10, n2=10, color_func=lambda x: x) + xx, yy, zz = s.get_data() + col = s.eval_color_func(xx, yy, zz) + assert np.allclose(xx, col) + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + adaptive=False, n1=10, n2=10, color_func=lambda x, y: x * y) + xx, yy, zz = s.get_data() + col = s.eval_color_func(xx, yy, zz) + assert np.allclose(xx * yy, col) + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + adaptive=False, n1=10, n2=10, color_func=lambda x, y, z: x * y * z) + xx, yy, zz = s.get_data() + col = s.eval_color_func(xx, yy, zz) + assert np.allclose(xx * yy * zz, col) + + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1), adaptive=False, + n1=10, n2=10, color_func=lambda u:u) + xx, yy, zz, uu, vv = s.get_data() + col = s.eval_color_func(xx, yy, zz, uu, vv) + assert np.allclose(uu, col) + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1), adaptive=False, + n1=10, n2=10, color_func=lambda u, v: u * v) + xx, yy, zz, uu, vv = s.get_data() + col = s.eval_color_func(xx, yy, zz, uu, vv) + assert np.allclose(uu * vv, col) + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1), adaptive=False, + n1=10, n2=10, color_func=lambda x, y, z: x * y * z) + xx, yy, zz, uu, vv = s.get_data() + col = s.eval_color_func(xx, yy, zz, uu, vv) + assert np.allclose(xx * yy * zz, col) + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1), adaptive=False, + n1=10, n2=10, color_func=lambda x, y, z, u, v: x * y * z * u * v) + xx, yy, zz, uu, vv = s.get_data() + col = s.eval_color_func(xx, yy, zz, uu, vv) + assert np.allclose(xx * yy * zz * uu * vv, col) + + # Interactive Series + s = List2DSeries([0, 1, 2, x], [x, 2, 3, 4], + color_func=lambda x, y: 2 * x, params={x: 1}, use_cm=True) + xx, yy, col = s.get_data() + assert np.allclose(xx, [0, 1, 2, 1]) + assert np.allclose(yy, [1, 2, 3, 4]) + assert np.allclose(2 * xx, col) + assert s.is_parametric and s.use_cm + + s = List2DSeries([0, 1, 2, x], [x, 2, 3, 4], + color_func=lambda x, y: 2 * x, params={x: 1}, use_cm=False) + assert len(s.get_data()) == 2 + assert not s.is_parametric + + +def test_color_func_scalar_val(): + # verify that eval_color_func returns a numpy array even when color_func + # evaluates to a scalar value + if not np: + skip("numpy not installed.") + + x, y = symbols("x, y") + + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda t: 1) + xx, yy, col = s.get_data() + assert np.allclose(col, np.ones(xx.shape)) + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 2*pi), + adaptive=False, n=10, color_func=lambda t: 1) + xx, yy, zz, col = s.get_data() + assert np.allclose(col, np.ones(xx.shape)) + + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + adaptive=False, n1=10, n2=10, color_func=lambda x: 1) + xx, yy, zz = s.get_data() + assert np.allclose(s.eval_color_func(xx), np.ones(xx.shape)) + + s = ParametricSurfaceSeries(1, x, y, (x, 0, 1), (y, 0, 1), adaptive=False, + n1=10, n2=10, color_func=lambda u: 1) + xx, yy, zz, uu, vv = s.get_data() + col = s.eval_color_func(xx, yy, zz, uu, vv) + assert np.allclose(col, np.ones(xx.shape)) + + +def test_color_func_expression(): + # verify that color_func is able to deal with instances of Expr: they will + # be lambdified with the same signature used for the main expression. + if not np: + skip("numpy not installed.") + + x, y = symbols("x, y") + + s1 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + color_func=sin(x), adaptive=False, n=10, use_cm=True) + s2 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + color_func=lambda x: np.cos(x), adaptive=False, n=10, use_cm=True) + # the following statement should not raise errors + d1 = s1.get_data() + assert callable(s1.color_func) + d2 = s2.get_data() + assert not np.allclose(d1[-1], d2[-1]) + + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -pi, pi), (y, -pi, pi), + color_func=sin(x**2 + y**2), adaptive=False, n1=5, n2=5) + # the following statement should not raise errors + s.get_data() + assert callable(s.color_func) + + xx = [1, 2, 3, 4, 5] + yy = [1, 2, 3, 4, 5] + raises(TypeError, + lambda : List2DSeries(xx, yy, use_cm=True, color_func=sin(x))) + + +def test_line_surface_color(): + # verify the back-compatibility with the old sympy.plotting module. + # By setting line_color or surface_color to be a callable, it will set + # the color_func attribute. + + x, y, z = symbols("x, y, z") + + s = LineOver1DRangeSeries(sin(x), (x, -5, 5), adaptive=False, n=10, + line_color=lambda x: x) + assert (s.line_color is None) and callable(s.color_func) + + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 2*pi), + adaptive=False, n=10, line_color=lambda t: t) + assert (s.line_color is None) and callable(s.color_func) + + s = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -2, 2), (y, -2, 2), + n1=10, n2=10, surface_color=lambda x: x) + assert (s.surface_color is None) and callable(s.color_func) + + +def test_complex_adaptive_false(): + # verify that series with adaptive=False is evaluated with discretized + # ranges of type complex. + if not np: + skip("numpy not installed.") + + x, y, u = symbols("x y u") + + def do_test(data1, data2): + assert len(data1) == len(data2) + for d1, d2 in zip(data1, data2): + assert np.allclose(d1, d2) + + expr1 = sqrt(x) * exp(-x**2) + expr2 = sqrt(u * x) * exp(-x**2) + s1 = LineOver1DRangeSeries(im(expr1), (x, -5, 5), adaptive=False, n=10) + s2 = LineOver1DRangeSeries(im(expr2), (x, -5, 5), + adaptive=False, n=10, params={u: 1}) + data1 = s1.get_data() + data2 = s2.get_data() + + do_test(data1, data2) + assert (not np.allclose(data1[1], 0)) and (not np.allclose(data2[1], 0)) + + s1 = Parametric2DLineSeries(re(expr1), im(expr1), (x, -pi, pi), + adaptive=False, n=10) + s2 = Parametric2DLineSeries(re(expr2), im(expr2), (x, -pi, pi), + adaptive=False, n=10, params={u: 1}) + data1 = s1.get_data() + data2 = s2.get_data() + do_test(data1, data2) + assert (not np.allclose(data1[1], 0)) and (not np.allclose(data2[1], 0)) + + s1 = SurfaceOver2DRangeSeries(im(expr1), (x, -5, 5), (y, -10, 10), + adaptive=False, n1=30, n2=3) + s2 = SurfaceOver2DRangeSeries(im(expr2), (x, -5, 5), (y, -10, 10), + adaptive=False, n1=30, n2=3, params={u: 1}) + data1 = s1.get_data() + data2 = s2.get_data() + do_test(data1, data2) + assert (not np.allclose(data1[1], 0)) and (not np.allclose(data2[1], 0)) + + +def test_expr_is_lambda_function(): + # verify that when a numpy function is provided, the series will be able + # to evaluate it. Also, label should be empty in order to prevent some + # backend from crashing. + if not np: + skip("numpy not installed.") + + f = lambda x: np.cos(x) + s1 = LineOver1DRangeSeries(f, ("x", -5, 5), adaptive=True, depth=3) + s1.get_data() + s2 = LineOver1DRangeSeries(f, ("x", -5, 5), adaptive=False, n=10) + s2.get_data() + assert s1.label == s2.label == "" + + fx = lambda x: np.cos(x) + fy = lambda x: np.sin(x) + s1 = Parametric2DLineSeries(fx, fy, ("x", 0, 2*pi), + adaptive=True, adaptive_goal=0.1) + s1.get_data() + s2 = Parametric2DLineSeries(fx, fy, ("x", 0, 2*pi), + adaptive=False, n=10) + s2.get_data() + assert s1.label == s2.label == "" + + fz = lambda x: x + s1 = Parametric3DLineSeries(fx, fy, fz, ("x", 0, 2*pi), + adaptive=True, adaptive_goal=0.1) + s1.get_data() + s2 = Parametric3DLineSeries(fx, fy, fz, ("x", 0, 2*pi), + adaptive=False, n=10) + s2.get_data() + assert s1.label == s2.label == "" + + f = lambda x, y: np.cos(x**2 + y**2) + s1 = SurfaceOver2DRangeSeries(f, ("a", -2, 2), ("b", -3, 3), + adaptive=False, n1=10, n2=10) + s1.get_data() + s2 = ContourSeries(f, ("a", -2, 2), ("b", -3, 3), + adaptive=False, n1=10, n2=10) + s2.get_data() + assert s1.label == s2.label == "" + + fx = lambda u, v: np.cos(u + v) + fy = lambda u, v: np.sin(u - v) + fz = lambda u, v: u * v + s1 = ParametricSurfaceSeries(fx, fy, fz, ("u", 0, pi), ("v", 0, 2*pi), + adaptive=False, n1=10, n2=10) + s1.get_data() + assert s1.label == "" + + raises(TypeError, lambda: List2DSeries(lambda t: t, lambda t: t)) + raises(TypeError, lambda : ImplicitSeries(lambda t: np.sin(t), + ("x", -5, 5), ("y", -6, 6))) + + +def test_show_in_legend_lines(): + # verify that lines series correctly set the show_in_legend attribute + x, u = symbols("x, u") + + s = LineOver1DRangeSeries(cos(x), (x, -2, 2), "test", show_in_legend=True) + assert s.show_in_legend + s = LineOver1DRangeSeries(cos(x), (x, -2, 2), "test", show_in_legend=False) + assert not s.show_in_legend + + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 1), "test", + show_in_legend=True) + assert s.show_in_legend + s = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 1), "test", + show_in_legend=False) + assert not s.show_in_legend + + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 1), "test", + show_in_legend=True) + assert s.show_in_legend + s = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 1), "test", + show_in_legend=False) + assert not s.show_in_legend + + +@XFAIL +def test_particular_case_1_with_adaptive_true(): + # Verify that symbolic expressions and numerical lambda functions are + # evaluated with the same algorithm. + if not np: + skip("numpy not installed.") + + # NOTE: xfail because sympy's adaptive algorithm is not deterministic + + def do_test(a, b): + with warns( + RuntimeWarning, + match="invalid value encountered in scalar power", + test_stacklevel=False, + ): + d1 = a.get_data() + d2 = b.get_data() + for t, v in zip(d1, d2): + assert np.allclose(t, v) + + n = symbols("n") + a = S(2) / 3 + epsilon = 0.01 + xn = (n**3 + n**2)**(S(1)/3) - (n**3 - n**2)**(S(1)/3) + expr = Abs(xn - a) - epsilon + math_func = lambdify([n], expr) + s1 = LineOver1DRangeSeries(expr, (n, -10, 10), "", + adaptive=True, depth=3) + s2 = LineOver1DRangeSeries(math_func, ("n", -10, 10), "", + adaptive=True, depth=3) + do_test(s1, s2) + + +def test_particular_case_1_with_adaptive_false(): + # Verify that symbolic expressions and numerical lambda functions are + # evaluated with the same algorithm. In particular, uniform evaluation + # is going to use np.vectorize, which correctly evaluates the following + # mathematical function. + if not np: + skip("numpy not installed.") + + def do_test(a, b): + d1 = a.get_data() + d2 = b.get_data() + for t, v in zip(d1, d2): + assert np.allclose(t, v) + + n = symbols("n") + a = S(2) / 3 + epsilon = 0.01 + xn = (n**3 + n**2)**(S(1)/3) - (n**3 - n**2)**(S(1)/3) + expr = Abs(xn - a) - epsilon + math_func = lambdify([n], expr) + + s3 = LineOver1DRangeSeries(expr, (n, -10, 10), "", + adaptive=False, n=10) + s4 = LineOver1DRangeSeries(math_func, ("n", -10, 10), "", + adaptive=False, n=10) + do_test(s3, s4) + + +def test_complex_params_number_eval(): + # The main expression contains terms like sqrt(xi - 1), with + # parameter (0 <= xi <= 1). + # There shouldn't be any NaN values on the output. + if not np: + skip("numpy not installed.") + + xi, wn, x0, v0, t = symbols("xi, omega_n, x0, v0, t") + x = Function("x")(t) + eq = x.diff(t, 2) + 2 * xi * wn * x.diff(t) + wn**2 * x + sol = dsolve(eq, x, ics={x.subs(t, 0): x0, x.diff(t).subs(t, 0): v0}) + params = { + wn: 0.5, + xi: 0.25, + x0: 0.45, + v0: 0.0 + } + s = LineOver1DRangeSeries(sol.rhs, (t, 0, 100), adaptive=False, n=5, + params=params) + x, y = s.get_data() + assert not np.isnan(x).any() + assert not np.isnan(y).any() + + + # Fourier Series of a sawtooth wave + # The main expression contains a Sum with a symbolic upper range. + # The lambdified code looks like: + # sum(blablabla for for n in range(1, m+1)) + # But range requires integer numbers, whereas per above example, the series + # casts parameters to complex. Verify that the series is able to detect + # upper bounds in summations and cast it to int in order to get successful + # evaluation + x, T, n, m = symbols("x, T, n, m") + fs = S(1) / 2 - (1 / pi) * Sum(sin(2 * n * pi * x / T) / n, (n, 1, m)) + params = { + T: 4.5, + m: 5 + } + s = LineOver1DRangeSeries(fs, (x, 0, 10), adaptive=False, n=5, + params=params) + x, y = s.get_data() + assert not np.isnan(x).any() + assert not np.isnan(y).any() + + +def test_complex_range_line_plot_1(): + # verify that univariate functions are evaluated with a complex + # data range (with zero imaginary part). There shouldn't be any + # NaN value in the output. + if not np: + skip("numpy not installed.") + + x, u = symbols("x, u") + expr1 = im(sqrt(x) * exp(-x**2)) + expr2 = im(sqrt(u * x) * exp(-x**2)) + s1 = LineOver1DRangeSeries(expr1, (x, -10, 10), adaptive=True, + adaptive_goal=0.1) + s2 = LineOver1DRangeSeries(expr1, (x, -10, 10), adaptive=False, n=30) + s3 = LineOver1DRangeSeries(expr2, (x, -10, 10), adaptive=False, n=30, + params={u: 1}) + + with ignore_warnings(RuntimeWarning): + data1 = s1.get_data() + data2 = s2.get_data() + data3 = s3.get_data() + + assert not np.isnan(data1[1]).any() + assert not np.isnan(data2[1]).any() + assert not np.isnan(data3[1]).any() + assert np.allclose(data2[0], data3[0]) and np.allclose(data2[1], data3[1]) + + +@XFAIL +def test_complex_range_line_plot_2(): + # verify that univariate functions are evaluated with a complex + # data range (with non-zero imaginary part). There shouldn't be any + # NaN value in the output. + if not np: + skip("numpy not installed.") + + # NOTE: xfail because sympy's adaptive algorithm is unable to deal with + # complex number. + + x, u = symbols("x, u") + + # adaptive and uniform meshing should produce the same data. + # because of the adaptive nature, just compare the first and last points + # of both series. + s1 = LineOver1DRangeSeries(abs(sqrt(x)), (x, -5-2j, 5-2j), adaptive=True) + s2 = LineOver1DRangeSeries(abs(sqrt(x)), (x, -5-2j, 5-2j), adaptive=False, + n=10) + with warns( + RuntimeWarning, + match="invalid value encountered in sqrt", + test_stacklevel=False, + ): + d1 = s1.get_data() + d2 = s2.get_data() + xx1 = [d1[0][0], d1[0][-1]] + xx2 = [d2[0][0], d2[0][-1]] + yy1 = [d1[1][0], d1[1][-1]] + yy2 = [d2[1][0], d2[1][-1]] + assert np.allclose(xx1, xx2) + assert np.allclose(yy1, yy2) + + +def test_force_real_eval(): + # verify that force_real_eval=True produces inconsistent results when + # compared with evaluation of complex domain. + if not np: + skip("numpy not installed.") + + x = symbols("x") + + expr = im(sqrt(x) * exp(-x**2)) + s1 = LineOver1DRangeSeries(expr, (x, -10, 10), adaptive=False, n=10, + force_real_eval=False) + s2 = LineOver1DRangeSeries(expr, (x, -10, 10), adaptive=False, n=10, + force_real_eval=True) + d1 = s1.get_data() + with ignore_warnings(RuntimeWarning): + d2 = s2.get_data() + assert not np.allclose(d1[1], 0) + assert np.allclose(d2[1], 0) + + +def test_contour_series_show_clabels(): + # verify that a contour series has the abiliy to set the visibility of + # labels to contour lines + + x, y = symbols("x, y") + s = ContourSeries(cos(x*y), (x, -2, 2), (y, -2, 2)) + assert s.show_clabels + + s = ContourSeries(cos(x*y), (x, -2, 2), (y, -2, 2), clabels=True) + assert s.show_clabels + + s = ContourSeries(cos(x*y), (x, -2, 2), (y, -2, 2), clabels=False) + assert not s.show_clabels + + +def test_LineOver1DRangeSeries_complex_range(): + # verify that LineOver1DRangeSeries can accept a complex range + # if the imaginary part of the start and end values are the same + + x = symbols("x") + + LineOver1DRangeSeries(sqrt(x), (x, -10, 10)) + LineOver1DRangeSeries(sqrt(x), (x, -10-2j, 10-2j)) + raises(ValueError, + lambda : LineOver1DRangeSeries(sqrt(x), (x, -10-2j, 10+2j))) + + +def test_symbolic_plotting_ranges(): + # verify that data series can use symbolic plotting ranges + if not np: + skip("numpy not installed.") + + x, y, z, a, b = symbols("x, y, z, a, b") + + def do_test(s1, s2, new_params): + d1 = s1.get_data() + d2 = s2.get_data() + for u, v in zip(d1, d2): + assert np.allclose(u, v) + s2.params = new_params + d2 = s2.get_data() + for u, v in zip(d1, d2): + assert not np.allclose(u, v) + + s1 = LineOver1DRangeSeries(sin(x), (x, 0, 1), adaptive=False, n=10) + s2 = LineOver1DRangeSeries(sin(x), (x, a, b), params={a: 0, b: 1}, + adaptive=False, n=10) + do_test(s1, s2, {a: 0.5, b: 1.5}) + + # missing a parameter + raises(ValueError, + lambda : LineOver1DRangeSeries(sin(x), (x, a, b), params={a: 1}, n=10)) + + s1 = Parametric2DLineSeries(cos(x), sin(x), (x, 0, 1), adaptive=False, n=10) + s2 = Parametric2DLineSeries(cos(x), sin(x), (x, a, b), params={a: 0, b: 1}, + adaptive=False, n=10) + do_test(s1, s2, {a: 0.5, b: 1.5}) + + # missing a parameter + raises(ValueError, + lambda : Parametric2DLineSeries(cos(x), sin(x), (x, a, b), + params={a: 0}, adaptive=False, n=10)) + + s1 = Parametric3DLineSeries(cos(x), sin(x), x, (x, 0, 1), + adaptive=False, n=10) + s2 = Parametric3DLineSeries(cos(x), sin(x), x, (x, a, b), + params={a: 0, b: 1}, adaptive=False, n=10) + do_test(s1, s2, {a: 0.5, b: 1.5}) + + # missing a parameter + raises(ValueError, + lambda : Parametric3DLineSeries(cos(x), sin(x), x, (x, a, b), + params={a: 0}, adaptive=False, n=10)) + + s1 = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -pi, pi), (y, -pi, pi), + adaptive=False, n1=5, n2=5) + s2 = SurfaceOver2DRangeSeries(cos(x**2 + y**2), (x, -pi * a, pi * a), + (y, -pi * b, pi * b), params={a: 1, b: 1}, + adaptive=False, n1=5, n2=5) + do_test(s1, s2, {a: 0.5, b: 1.5}) + + # missing a parameter + raises(ValueError, + lambda : SurfaceOver2DRangeSeries(cos(x**2 + y**2), + (x, -pi * a, pi * a), (y, -pi * b, pi * b), params={a: 1}, + adaptive=False, n1=5, n2=5)) + # one range symbol is included into another range's minimum or maximum val + raises(ValueError, + lambda : SurfaceOver2DRangeSeries(cos(x**2 + y**2), + (x, -pi * a + y, pi * a), (y, -pi * b, pi * b), params={a: 1}, + adaptive=False, n1=5, n2=5)) + + s1 = ParametricSurfaceSeries( + cos(x - y), sin(x + y), x - y, (x, -2, 2), (y, -2, 2), n1=5, n2=5) + s2 = ParametricSurfaceSeries( + cos(x - y), sin(x + y), x - y, (x, -2 * a, 2), (y, -2, 2 * b), + params={a: 1, b: 1}, n1=5, n2=5) + do_test(s1, s2, {a: 0.5, b: 1.5}) + + # missing a parameter + raises(ValueError, + lambda : ParametricSurfaceSeries( + cos(x - y), sin(x + y), x - y, (x, -2 * a, 2), (y, -2, 2 * b), + params={a: 1}, n1=5, n2=5)) + + +def test_exclude_points(): + # verify that exclude works as expected + if not np: + skip("numpy not installed.") + + x = symbols("x") + + expr = (floor(x) + S.Half) / (1 - (x - S.Half)**2) + + with warns( + UserWarning, + match="NumPy is unable to evaluate with complex numbers some", + test_stacklevel=False, + ): + s = LineOver1DRangeSeries(expr, (x, -3.5, 3.5), adaptive=False, n=100, + exclude=list(range(-3, 4))) + xx, yy = s.get_data() + assert not np.isnan(xx).any() + assert np.count_nonzero(np.isnan(yy)) == 7 + assert len(xx) > 100 + + e1 = log(floor(x)) * cos(x) + e2 = log(floor(x)) * sin(x) + with warns( + UserWarning, + match="NumPy is unable to evaluate with complex numbers some", + test_stacklevel=False, + ): + s = Parametric2DLineSeries(e1, e2, (x, 1, 12), adaptive=False, n=100, + exclude=list(range(1, 13))) + xx, yy, pp = s.get_data() + assert not np.isnan(pp).any() + assert np.count_nonzero(np.isnan(xx)) == 11 + assert np.count_nonzero(np.isnan(yy)) == 11 + assert len(xx) > 100 + + +def test_unwrap(): + # verify that unwrap works as expected + if not np: + skip("numpy not installed.") + + x, y = symbols("x, y") + expr = 1 / (x**3 + 2*x**2 + x) + expr = arg(expr.subs(x, I*y*2*pi)) + s1 = LineOver1DRangeSeries(expr, (y, 1e-05, 1e05), xscale="log", + adaptive=False, n=10, unwrap=False) + s2 = LineOver1DRangeSeries(expr, (y, 1e-05, 1e05), xscale="log", + adaptive=False, n=10, unwrap=True) + s3 = LineOver1DRangeSeries(expr, (y, 1e-05, 1e05), xscale="log", + adaptive=False, n=10, unwrap={"period": 4}) + x1, y1 = s1.get_data() + x2, y2 = s2.get_data() + x3, y3 = s3.get_data() + assert np.allclose(x1, x2) + # there must not be nan values in the results of these evaluations + assert all(not np.isnan(t).any() for t in [y1, y2, y3]) + assert not np.allclose(y1, y2) + assert not np.allclose(y1, y3) + assert not np.allclose(y2, y3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_textplot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_textplot.py new file mode 100644 index 0000000000000000000000000000000000000000..928085c627e5230f2ac4a8ce0bbac5354ab35d51 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_textplot.py @@ -0,0 +1,203 @@ +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.plotting.textplot import textplot_str + +from sympy.utilities.exceptions import ignore_warnings + + +def test_axes_alignment(): + x = Symbol('x') + lines = [ + ' 1 | ..', + ' | ... ', + ' | .. ', + ' | ... ', + ' | ... ', + ' | .. ', + ' | ... ', + ' | ... ', + ' | .. ', + ' | ... ', + ' 0 |--------------------------...--------------------------', + ' | ... ', + ' | .. ', + ' | ... ', + ' | ... ', + ' | .. ', + ' | ... ', + ' | ... ', + ' | .. ', + ' | ... ', + ' -1 |_______________________________________________________', + ' -1 0 1' + ] + assert lines == list(textplot_str(x, -1, 1)) + + lines = [ + ' 1 | ..', + ' | .... ', + ' | ... ', + ' | ... ', + ' | .... ', + ' | ... ', + ' | ... ', + ' | .... ', + ' 0 |--------------------------...--------------------------', + ' | .... ', + ' | ... ', + ' | ... ', + ' | .... ', + ' | ... ', + ' | ... ', + ' | .... ', + ' -1 |_______________________________________________________', + ' -1 0 1' + ] + assert lines == list(textplot_str(x, -1, 1, H=17)) + + +def test_singularity(): + x = Symbol('x') + lines = [ + ' 54 | . ', + ' | ', + ' | ', + ' | ', + ' | ',' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' 27.5 |--.----------------------------------------------------', + ' | ', + ' | ', + ' | ', + ' | . ', + ' | \\ ', + ' | \\ ', + ' | .. ', + ' | ... ', + ' | ............. ', + ' 1 |_______________________________________________________', + ' 0 0.5 1' + ] + assert lines == list(textplot_str(1/x, 0, 1)) + + lines = [ + ' 0 | ......', + ' | ........ ', + ' | ........ ', + ' | ...... ', + ' | ..... ', + ' | .... ', + ' | ... ', + ' | .. ', + ' | ... ', + ' | / ', + ' -2 |-------..----------------------------------------------', + ' | / ', + ' | / ', + ' | / ', + ' | . ', + ' | ', + ' | . ', + ' | ', + ' | ', + ' | ', + ' -4 |_______________________________________________________', + ' 0 0.5 1' + ] + # RuntimeWarning: divide by zero encountered in log + with ignore_warnings(RuntimeWarning): + assert lines == list(textplot_str(log(x), 0, 1)) + + +def test_sinc(): + x = Symbol('x') + lines = [ + ' 1 | . . ', + ' | . . ', + ' | ', + ' | . . ', + ' | ', + ' | . . ', + ' | ', + ' | ', + ' | . . ', + ' | ', + ' 0.4 |-------------------------------------------------------', + ' | . . ', + ' | ', + ' | . . ', + ' | ', + ' | ..... ..... ', + ' | .. \\ . . / .. ', + ' | / \\ / \\ ', + ' |/ \\ . . / \\', + ' | \\ / \\ / ', + ' -0.2 |_______________________________________________________', + ' -10 0 10' + ] + # RuntimeWarning: invalid value encountered in double_scalars + with ignore_warnings(RuntimeWarning): + assert lines == list(textplot_str(sin(x)/x, -10, 10)) + + +def test_imaginary(): + x = Symbol('x') + lines = [ + ' 1 | ..', + ' | .. ', + ' | ... ', + ' | .. ', + ' | .. ', + ' | .. ', + ' | .. ', + ' | .. ', + ' | .. ', + ' | / ', + ' 0.5 |----------------------------------/--------------------', + ' | .. ', + ' | / ', + ' | . ', + ' | ', + ' | . ', + ' | . ', + ' | ', + ' | ', + ' | ', + ' 0 |_______________________________________________________', + ' -1 0 1' + ] + # RuntimeWarning: invalid value encountered in sqrt + with ignore_warnings(RuntimeWarning): + assert list(textplot_str(sqrt(x), -1, 1)) == lines + + lines = [ + ' 1 | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' 0 |-------------------------------------------------------', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' | ', + ' -1 |_______________________________________________________', + ' -1 0 1' + ] + assert list(textplot_str(S.ImaginaryUnit, -1, 1)) == lines diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_utils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_utils.py new file mode 100644 index 0000000000000000000000000000000000000000..4206a8b001319552c2e2be1aeb46057e6f708912 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/tests/test_utils.py @@ -0,0 +1,110 @@ +from pytest import raises +from sympy import ( + symbols, Expr, Tuple, Integer, cos, solveset, FiniteSet, ImageSet) +from sympy.plotting.utils import ( + _create_ranges, _plot_sympify, extract_solution) +from sympy.physics.mechanics import ReferenceFrame, Vector as MechVector +from sympy.vector import CoordSys3D, Vector + + +def test_plot_sympify(): + x, y = symbols("x, y") + + # argument is already sympified + args = x + y + r = _plot_sympify(args) + assert r == args + + # one argument needs to be sympified + args = (x + y, 1) + r = _plot_sympify(args) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 2 + assert isinstance(r[0], Expr) + assert isinstance(r[1], Integer) + + # string and dict should not be sympified + args = (x + y, (x, 0, 1), "str", 1, {1: 1, 2: 2.0}) + r = _plot_sympify(args) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 5 + assert isinstance(r[0], Expr) + assert isinstance(r[1], Tuple) + assert isinstance(r[2], str) + assert isinstance(r[3], Integer) + assert isinstance(r[4], dict) and isinstance(r[4][1], int) and isinstance(r[4][2], float) + + # nested arguments containing strings + args = ((x + y, (y, 0, 1), "a"), (x + 1, (x, 0, 1), "$f_{1}$")) + r = _plot_sympify(args) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 2 + assert isinstance(r[0], Tuple) + assert isinstance(r[0][1], Tuple) + assert isinstance(r[0][1][1], Integer) + assert isinstance(r[0][2], str) + assert isinstance(r[1], Tuple) + assert isinstance(r[1][1], Tuple) + assert isinstance(r[1][1][1], Integer) + assert isinstance(r[1][2], str) + + # vectors from sympy.physics.vectors module are not sympified + # vectors from sympy.vectors are sympified + # in both cases, no error should be raised + R = ReferenceFrame("R") + v1 = 2 * R.x + R.y + C = CoordSys3D("C") + v2 = 2 * C.i + C.j + args = (v1, v2) + r = _plot_sympify(args) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 2 + assert isinstance(v1, MechVector) + assert isinstance(v2, Vector) + + +def test_create_ranges(): + x, y = symbols("x, y") + + # user don't provide any range -> return a default range + r = _create_ranges({x}, [], 1) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 1 + assert isinstance(r[0], (Tuple, tuple)) + assert r[0] == (x, -10, 10) + + r = _create_ranges({x, y}, [], 2) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 2 + assert isinstance(r[0], (Tuple, tuple)) + assert isinstance(r[1], (Tuple, tuple)) + assert r[0] == (x, -10, 10) or (y, -10, 10) + assert r[1] == (y, -10, 10) or (x, -10, 10) + assert r[0] != r[1] + + # not enough ranges provided by the user -> create default ranges + r = _create_ranges( + {x, y}, + [ + (x, 0, 1), + ], + 2, + ) + assert isinstance(r, (list, tuple, Tuple)) and len(r) == 2 + assert isinstance(r[0], (Tuple, tuple)) + assert isinstance(r[1], (Tuple, tuple)) + assert r[0] == (x, 0, 1) or (y, -10, 10) + assert r[1] == (y, -10, 10) or (x, 0, 1) + assert r[0] != r[1] + + # too many free symbols + raises(ValueError, lambda: _create_ranges({x, y}, [], 1)) + raises(ValueError, lambda: _create_ranges({x, y}, [(x, 0, 5), (y, 0, 1)], 1)) + + +def test_extract_solution(): + x = symbols("x") + + sol = solveset(cos(10 * x)) + assert sol.has(ImageSet) + res = extract_solution(sol) + assert len(res) == 20 + assert isinstance(res, FiniteSet) + + res = extract_solution(sol, 20) + assert len(res) == 40 + assert isinstance(res, FiniteSet) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/textplot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/textplot.py new file mode 100644 index 0000000000000000000000000000000000000000..5f1f2b639d6c387a6a36cf89fe36bc7717c92b2b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/textplot.py @@ -0,0 +1,168 @@ +from sympy.core.numbers import Float +from sympy.core.symbol import Dummy +from sympy.utilities.lambdify import lambdify + +import math + + +def is_valid(x): + """Check if a floating point number is valid""" + if x is None: + return False + if isinstance(x, complex): + return False + return not math.isinf(x) and not math.isnan(x) + + +def rescale(y, W, H, mi, ma): + """Rescale the given array `y` to fit into the integer values + between `0` and `H-1` for the values between ``mi`` and ``ma``. + """ + y_new = [] + + norm = ma - mi + offset = (ma + mi) / 2 + + for x in range(W): + if is_valid(y[x]): + normalized = (y[x] - offset) / norm + if not is_valid(normalized): + y_new.append(None) + else: + rescaled = Float((normalized*H + H/2) * (H-1)/H).round() + rescaled = int(rescaled) + y_new.append(rescaled) + else: + y_new.append(None) + return y_new + + +def linspace(start, stop, num): + return [start + (stop - start) * x / (num-1) for x in range(num)] + + +def textplot_str(expr, a, b, W=55, H=21): + """Generator for the lines of the plot""" + free = expr.free_symbols + if len(free) > 1: + raise ValueError( + "The expression must have a single variable. (Got {})" + .format(free)) + x = free.pop() if free else Dummy() + f = lambdify([x], expr) + if isinstance(a, complex): + if a.imag == 0: + a = a.real + if isinstance(b, complex): + if b.imag == 0: + b = b.real + a = float(a) + b = float(b) + + # Calculate function values + x = linspace(a, b, W) + y = [] + for val in x: + try: + y.append(f(val)) + # Not sure what exceptions to catch here or why... + except (ValueError, TypeError, ZeroDivisionError): + y.append(None) + + # Normalize height to screen space + y_valid = list(filter(is_valid, y)) + if y_valid: + ma = max(y_valid) + mi = min(y_valid) + if ma == mi: + if ma: + mi, ma = sorted([0, 2*ma]) + else: + mi, ma = -1, 1 + else: + mi, ma = -1, 1 + y_range = ma - mi + precision = math.floor(math.log10(y_range)) - 1 + precision *= -1 + mi = round(mi, precision) + ma = round(ma, precision) + y = rescale(y, W, H, mi, ma) + + y_bins = linspace(mi, ma, H) + + # Draw plot + margin = 7 + for h in range(H - 1, -1, -1): + s = [' '] * W + for i in range(W): + if y[i] == h: + if (i == 0 or y[i - 1] == h - 1) and (i == W - 1 or y[i + 1] == h + 1): + s[i] = '/' + elif (i == 0 or y[i - 1] == h + 1) and (i == W - 1 or y[i + 1] == h - 1): + s[i] = '\\' + else: + s[i] = '.' + + if h == 0: + for i in range(W): + s[i] = '_' + + # Print y values + if h in (0, H//2, H - 1): + prefix = ("%g" % y_bins[h]).rjust(margin)[:margin] + else: + prefix = " "*margin + s = "".join(s) + if h == H//2: + s = s.replace(" ", "-") + yield prefix + " |" + s + + # Print x values + bottom = " " * (margin + 2) + bottom += ("%g" % x[0]).ljust(W//2) + if W % 2 == 1: + bottom += ("%g" % x[W//2]).ljust(W//2) + else: + bottom += ("%g" % x[W//2]).ljust(W//2-1) + bottom += "%g" % x[-1] + yield bottom + + +def textplot(expr, a, b, W=55, H=21): + r""" + Print a crude ASCII art plot of the SymPy expression 'expr' (which + should contain a single symbol, e.g. x or something else) over the + interval [a, b]. + + Examples + ======== + + >>> from sympy import Symbol, sin + >>> from sympy.plotting import textplot + >>> t = Symbol('t') + >>> textplot(sin(t)*t, 0, 15) + 14 | ... + | . + | . + | . + | . + | ... + | / . . + | / + | / . + | . . . + 1.5 |----.......-------------------------------------------- + |.... \ . . + | \ / . + | .. / . + | \ / . + | .... + | . + | . . + | + | . . + -11 |_______________________________________________________ + 0 7.5 15 + """ + for line in textplot_str(expr, a, b, W, H): + print(line) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/utils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/utils.py new file mode 100644 index 0000000000000000000000000000000000000000..3213dea09b5a98e96094e7dffbd9b992c7d2b87e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/plotting/utils.py @@ -0,0 +1,323 @@ +from sympy.core.containers import Tuple +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.function import AppliedUndef +from sympy.core.relational import Relational +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify +from sympy.logic.boolalg import BooleanFunction +from sympy.sets.fancysets import ImageSet +from sympy.sets.sets import FiniteSet +from sympy.tensor.indexed import Indexed + + +def _get_free_symbols(exprs): + """Returns the free symbols of a symbolic expression. + + If the expression contains any of these elements, assume that they are + the "free symbols" of the expression: + + * indexed objects + * applied undefined function (useful for sympy.physics.mechanics module) + """ + if not isinstance(exprs, (list, tuple, set)): + exprs = [exprs] + if all(callable(e) for e in exprs): + return set() + + free = set().union(*[e.atoms(Indexed) for e in exprs]) + free = free.union(*[e.atoms(AppliedUndef) for e in exprs]) + return free or set().union(*[e.free_symbols for e in exprs]) + + +def extract_solution(set_sol, n=10): + """Extract numerical solutions from a set solution (computed by solveset, + linsolve, nonlinsolve). Often, it is not trivial do get something useful + out of them. + + Parameters + ========== + + n : int, optional + In order to replace ImageSet with FiniteSet, an iterator is created + for each ImageSet contained in `set_sol`, starting from 0 up to `n`. + Default value: 10. + """ + images = set_sol.find(ImageSet) + for im in images: + it = iter(im) + s = FiniteSet(*[next(it) for n in range(0, n)]) + set_sol = set_sol.subs(im, s) + return set_sol + + +def _plot_sympify(args): + """This function recursively loop over the arguments passed to the plot + functions: the sympify function will be applied to all arguments except + those of type string/dict. + + Generally, users can provide the following arguments to a plot function: + + expr, range1 [tuple, opt], ..., label [str, opt], rendering_kw [dict, opt] + + `expr, range1, ...` can be sympified, whereas `label, rendering_kw` can't. + In particular, whenever a special character like $, {, }, ... is used in + the `label`, sympify will raise an error. + """ + if isinstance(args, Expr): + return args + + args = list(args) + for i, a in enumerate(args): + if isinstance(a, (list, tuple)): + args[i] = Tuple(*_plot_sympify(a), sympify=False) + elif not (isinstance(a, (str, dict)) or callable(a) + # NOTE: check if it is a vector from sympy.physics.vector module + # without importing the module (because it slows down SymPy's + # import process and triggers SymPy's optional-dependencies + # tests to fail). + or ((a.__class__.__name__ == "Vector") and not isinstance(a, Basic)) + ): + args[i] = sympify(a) + return args + + +def _create_ranges(exprs, ranges, npar, label="", params=None): + """This function does two things: + + 1. Check if the number of free symbols is in agreement with the type of + plot chosen. For example, plot() requires 1 free symbol; + plot3d() requires 2 free symbols. + 2. Sometime users create plots without providing ranges for the variables. + Here we create the necessary ranges. + + Parameters + ========== + + exprs : iterable + The expressions from which to extract the free symbols + ranges : iterable + The limiting ranges provided by the user + npar : int + The number of free symbols required by the plot functions. + For example, + npar=1 for plot, npar=2 for plot3d, ... + params : dict + A dictionary mapping symbols to parameters for interactive plot. + """ + get_default_range = lambda symbol: Tuple(symbol, -10, 10) + + free_symbols = _get_free_symbols(exprs) + if params is not None: + free_symbols = free_symbols.difference(params.keys()) + + if len(free_symbols) > npar: + raise ValueError( + "Too many free symbols.\n" + + "Expected {} free symbols.\n".format(npar) + + "Received {}: {}".format(len(free_symbols), free_symbols) + ) + + if len(ranges) > npar: + raise ValueError( + "Too many ranges. Received %s, expected %s" % (len(ranges), npar)) + + # free symbols in the ranges provided by the user + rfs = set().union([r[0] for r in ranges]) + if len(rfs) != len(ranges): + raise ValueError("Multiple ranges with the same symbol") + + if len(ranges) < npar: + symbols = free_symbols.difference(rfs) + if symbols != set(): + # add a range for each missing free symbols + for s in symbols: + ranges.append(get_default_range(s)) + # if there is still room, fill them with dummys + for i in range(npar - len(ranges)): + ranges.append(get_default_range(Dummy())) + + if len(free_symbols) == npar: + # there could be times when this condition is not met, for example + # plotting the function f(x, y) = x (which is a plane); in this case, + # free_symbols = {x} whereas rfs = {x, y} (or x and Dummy) + rfs = set().union([r[0] for r in ranges]) + if len(free_symbols.difference(rfs)) > 0: + raise ValueError( + "Incompatible free symbols of the expressions with " + "the ranges.\n" + + "Free symbols in the expressions: {}\n".format(free_symbols) + + "Free symbols in the ranges: {}".format(rfs) + ) + return ranges + + +def _is_range(r): + """A range is defined as (symbol, start, end). start and end should + be numbers. + """ + # TODO: prange check goes here + return ( + isinstance(r, Tuple) + and (len(r) == 3) + and (not isinstance(r.args[1], str)) and r.args[1].is_number + and (not isinstance(r.args[2], str)) and r.args[2].is_number + ) + + +def _unpack_args(*args): + """Given a list/tuple of arguments previously processed by _plot_sympify() + and/or _check_arguments(), separates and returns its components: + expressions, ranges, label and rendering keywords. + + Examples + ======== + + >>> from sympy import cos, sin, symbols + >>> from sympy.plotting.utils import _plot_sympify, _unpack_args + >>> x, y = symbols('x, y') + >>> args = (sin(x), (x, -10, 10), "f1") + >>> args = _plot_sympify(args) + >>> _unpack_args(*args) + ([sin(x)], [(x, -10, 10)], 'f1', None) + + >>> args = (sin(x**2 + y**2), (x, -2, 2), (y, -3, 3), "f2") + >>> args = _plot_sympify(args) + >>> _unpack_args(*args) + ([sin(x**2 + y**2)], [(x, -2, 2), (y, -3, 3)], 'f2', None) + + >>> args = (sin(x + y), cos(x - y), x + y, (x, -2, 2), (y, -3, 3), "f3") + >>> args = _plot_sympify(args) + >>> _unpack_args(*args) + ([sin(x + y), cos(x - y), x + y], [(x, -2, 2), (y, -3, 3)], 'f3', None) + """ + ranges = [t for t in args if _is_range(t)] + labels = [t for t in args if isinstance(t, str)] + label = None if not labels else labels[0] + rendering_kw = [t for t in args if isinstance(t, dict)] + rendering_kw = None if not rendering_kw else rendering_kw[0] + # NOTE: why None? because args might have been preprocessed by + # _check_arguments, so None might represent the rendering_kw + results = [not (_is_range(a) or isinstance(a, (str, dict)) or (a is None)) for a in args] + exprs = [a for a, b in zip(args, results) if b] + return exprs, ranges, label, rendering_kw + + +def _check_arguments(args, nexpr, npar, **kwargs): + """Checks the arguments and converts into tuples of the + form (exprs, ranges, label, rendering_kw). + + Parameters + ========== + + args + The arguments provided to the plot functions + nexpr + The number of sub-expression forming an expression to be plotted. + For example: + nexpr=1 for plot. + nexpr=2 for plot_parametric: a curve is represented by a tuple of two + elements. + nexpr=1 for plot3d. + nexpr=3 for plot3d_parametric_line: a curve is represented by a tuple + of three elements. + npar + The number of free symbols required by the plot functions. For example, + npar=1 for plot, npar=2 for plot3d, ... + **kwargs : + keyword arguments passed to the plotting function. It will be used to + verify if ``params`` has ben provided. + + Examples + ======== + + .. plot:: + :context: reset + :format: doctest + :include-source: True + + >>> from sympy import cos, sin, symbols + >>> from sympy.plotting.plot import _check_arguments + >>> x = symbols('x') + >>> _check_arguments([cos(x), sin(x)], 2, 1) + [(cos(x), sin(x), (x, -10, 10), None, None)] + + >>> _check_arguments([cos(x), sin(x), "test"], 2, 1) + [(cos(x), sin(x), (x, -10, 10), 'test', None)] + + >>> _check_arguments([cos(x), sin(x), "test", {"a": 0, "b": 1}], 2, 1) + [(cos(x), sin(x), (x, -10, 10), 'test', {'a': 0, 'b': 1})] + + >>> _check_arguments([x, x**2], 1, 1) + [(x, (x, -10, 10), None, None), (x**2, (x, -10, 10), None, None)] + """ + if not args: + return [] + output = [] + params = kwargs.get("params", None) + + if all(isinstance(a, (Expr, Relational, BooleanFunction)) for a in args[:nexpr]): + # In this case, with a single plot command, we are plotting either: + # 1. one expression + # 2. multiple expressions over the same range + + exprs, ranges, label, rendering_kw = _unpack_args(*args) + free_symbols = set().union(*[e.free_symbols for e in exprs]) + ranges = _create_ranges(exprs, ranges, npar, label, params) + + if nexpr > 1: + # in case of plot_parametric or plot3d_parametric_line, there will + # be 2 or 3 expressions defining a curve. Group them together. + if len(exprs) == nexpr: + exprs = (tuple(exprs),) + for expr in exprs: + # need this if-else to deal with both plot/plot3d and + # plot_parametric/plot3d_parametric_line + is_expr = isinstance(expr, (Expr, Relational, BooleanFunction)) + e = (expr,) if is_expr else expr + output.append((*e, *ranges, label, rendering_kw)) + + else: + # In this case, we are plotting multiple expressions, each one with its + # range. Each "expression" to be plotted has the following form: + # (expr, range, label) where label is optional + + _, ranges, labels, rendering_kw = _unpack_args(*args) + labels = [labels] if labels else [] + + # number of expressions + n = (len(ranges) + len(labels) + + (len(rendering_kw) if rendering_kw is not None else 0)) + new_args = args[:-n] if n > 0 else args + + # at this point, new_args might just be [expr]. But I need it to be + # [[expr]] in order to be able to loop over + # [expr, range [opt], label [opt]] + if not isinstance(new_args[0], (list, tuple, Tuple)): + new_args = [new_args] + + # Each arg has the form (expr1, expr2, ..., range1 [optional], ..., + # label [optional], rendering_kw [optional]) + for arg in new_args: + # look for "local" range and label. If there is not, use "global". + l = [a for a in arg if isinstance(a, str)] + if not l: + l = labels + r = [a for a in arg if _is_range(a)] + if not r: + r = ranges.copy() + rend_kw = [a for a in arg if isinstance(a, dict)] + rend_kw = rendering_kw if len(rend_kw) == 0 else rend_kw[0] + + # NOTE: arg = arg[:nexpr] may raise an exception if lambda + # functions are used. Execute the following instead: + arg = [arg[i] for i in range(nexpr)] + free_symbols = set() + if all(not callable(a) for a in arg): + free_symbols = free_symbols.union(*[a.free_symbols for a in arg]) + if len(r) != npar: + r = _create_ranges(arg, r, npar, "", params) + + label = None if not l else l[0] + output.append((*arg, *r, label, rend_kw)) + return output diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8055ed12d213de3ebc7a1f17100607fb1e3b89b8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/__init__.py @@ -0,0 +1,130 @@ +"""Polynomial manipulation algorithms and algebraic objects. """ + +__all__ = [ + 'Poly', 'PurePoly', 'poly_from_expr', 'parallel_poly_from_expr', 'degree', + 'total_degree', 'degree_list', 'LC', 'LM', 'LT', 'pdiv', 'prem', 'pquo', + 'pexquo', 'div', 'rem', 'quo', 'exquo', 'half_gcdex', 'gcdex', 'invert', + 'subresultants', 'resultant', 'discriminant', 'cofactors', 'gcd_list', + 'gcd', 'lcm_list', 'lcm', 'terms_gcd', 'trunc', 'monic', 'content', + 'primitive', 'compose', 'decompose', 'sturm', 'gff_list', 'gff', + 'sqf_norm', 'sqf_part', 'sqf_list', 'sqf', 'factor_list', 'factor', + 'intervals', 'refine_root', 'count_roots', 'all_roots', 'real_roots', + 'nroots', 'ground_roots', 'nth_power_roots_poly', 'cancel', 'reduced', + 'groebner', 'is_zero_dimensional', 'GroebnerBasis', 'poly', + + 'symmetrize', 'horner', 'interpolate', 'rational_interpolate', 'viete', + + 'together', + + 'BasePolynomialError', 'ExactQuotientFailed', 'PolynomialDivisionFailed', + 'OperationNotSupported', 'HeuristicGCDFailed', 'HomomorphismFailed', + 'IsomorphismFailed', 'ExtraneousFactors', 'EvaluationFailed', + 'RefinementFailed', 'CoercionFailed', 'NotInvertible', 'NotReversible', + 'NotAlgebraic', 'DomainError', 'PolynomialError', 'UnificationFailed', + 'GeneratorsError', 'GeneratorsNeeded', 'ComputationFailed', + 'UnivariatePolynomialError', 'MultivariatePolynomialError', + 'PolificationFailed', 'OptionError', 'FlagError', + + 'minpoly', 'minimal_polynomial', 'primitive_element', 'field_isomorphism', + 'to_number_field', 'isolate', 'round_two', 'prime_decomp', + 'prime_valuation', 'galois_group', + + 'itermonomials', 'Monomial', + + 'lex', 'grlex', 'grevlex', 'ilex', 'igrlex', 'igrevlex', + + 'CRootOf', 'rootof', 'RootOf', 'ComplexRootOf', 'RootSum', + + 'roots', + + 'Domain', 'FiniteField', 'IntegerRing', 'RationalField', 'RealField', + 'ComplexField', 'PythonFiniteField', 'GMPYFiniteField', + 'PythonIntegerRing', 'GMPYIntegerRing', 'PythonRational', + 'GMPYRationalField', 'AlgebraicField', 'PolynomialRing', 'FractionField', + 'ExpressionDomain', 'FF_python', 'FF_gmpy', 'ZZ_python', 'ZZ_gmpy', + 'QQ_python', 'QQ_gmpy', 'GF', 'FF', 'ZZ', 'QQ', 'ZZ_I', 'QQ_I', 'RR', + 'CC', 'EX', 'EXRAW', + + 'construct_domain', + + 'swinnerton_dyer_poly', 'cyclotomic_poly', 'symmetric_poly', + 'random_poly', 'interpolating_poly', + + 'jacobi_poly', 'chebyshevt_poly', 'chebyshevu_poly', 'hermite_poly', + 'hermite_prob_poly', 'legendre_poly', 'laguerre_poly', + + 'bernoulli_poly', 'bernoulli_c_poly', 'genocchi_poly', 'euler_poly', + 'andre_poly', + + 'apart', 'apart_list', 'assemble_partfrac_list', + + 'Options', + + 'ring', 'xring', 'vring', 'sring', + + 'field', 'xfield', 'vfield', 'sfield' +] + +from .polytools import (Poly, PurePoly, poly_from_expr, + parallel_poly_from_expr, degree, total_degree, degree_list, LC, LM, + LT, pdiv, prem, pquo, pexquo, div, rem, quo, exquo, half_gcdex, gcdex, + invert, subresultants, resultant, discriminant, cofactors, gcd_list, + gcd, lcm_list, lcm, terms_gcd, trunc, monic, content, primitive, + compose, decompose, sturm, gff_list, gff, sqf_norm, sqf_part, + sqf_list, sqf, factor_list, factor, intervals, refine_root, + count_roots, all_roots, real_roots, nroots, ground_roots, + nth_power_roots_poly, cancel, reduced, groebner, is_zero_dimensional, + GroebnerBasis, poly) + +from .polyfuncs import (symmetrize, horner, interpolate, + rational_interpolate, viete) + +from .rationaltools import together + +from .polyerrors import (BasePolynomialError, ExactQuotientFailed, + PolynomialDivisionFailed, OperationNotSupported, HeuristicGCDFailed, + HomomorphismFailed, IsomorphismFailed, ExtraneousFactors, + EvaluationFailed, RefinementFailed, CoercionFailed, NotInvertible, + NotReversible, NotAlgebraic, DomainError, PolynomialError, + UnificationFailed, GeneratorsError, GeneratorsNeeded, + ComputationFailed, UnivariatePolynomialError, + MultivariatePolynomialError, PolificationFailed, OptionError, + FlagError) + +from .numberfields import (minpoly, minimal_polynomial, primitive_element, + field_isomorphism, to_number_field, isolate, round_two, prime_decomp, + prime_valuation, galois_group) + +from .monomials import itermonomials, Monomial + +from .orderings import lex, grlex, grevlex, ilex, igrlex, igrevlex + +from .rootoftools import CRootOf, rootof, RootOf, ComplexRootOf, RootSum + +from .polyroots import roots + +from .domains import (Domain, FiniteField, IntegerRing, RationalField, + RealField, ComplexField, PythonFiniteField, GMPYFiniteField, + PythonIntegerRing, GMPYIntegerRing, PythonRational, GMPYRationalField, + AlgebraicField, PolynomialRing, FractionField, ExpressionDomain, + FF_python, FF_gmpy, ZZ_python, ZZ_gmpy, QQ_python, QQ_gmpy, GF, FF, + ZZ, QQ, ZZ_I, QQ_I, RR, CC, EX, EXRAW) + +from .constructor import construct_domain + +from .specialpolys import (swinnerton_dyer_poly, cyclotomic_poly, + symmetric_poly, random_poly, interpolating_poly) + +from .orthopolys import (jacobi_poly, chebyshevt_poly, chebyshevu_poly, + hermite_poly, hermite_prob_poly, 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--git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/extensions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/extensions.py new file mode 100644 index 0000000000000000000000000000000000000000..2668f792b5721db877f275e57ed54961b2e4df93 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/extensions.py @@ -0,0 +1,356 @@ +"""Finite extensions of ring domains.""" + +from sympy.polys.domains.domain import Domain +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.polyerrors import (CoercionFailed, NotInvertible, + GeneratorsError) +from sympy.polys.polytools import Poly +from sympy.printing.defaults import DefaultPrinting + + +class ExtensionElement(DomainElement, DefaultPrinting): + """ + Element of a finite extension. + + A class of univariate polynomials modulo the ``modulus`` + of the extension ``ext``. It is represented by the + unique polynomial ``rep`` of lowest degree. Both + ``rep`` and the representation ``mod`` of ``modulus`` + are of class DMP. + + """ + __slots__ = ('rep', 'ext') + + def __init__(self, rep, ext): + self.rep = rep + self.ext = ext + + def parent(f): + return f.ext + + def as_expr(f): + return f.ext.to_sympy(f) + + def __bool__(f): + return bool(f.rep) + + def __pos__(f): + return f + + def __neg__(f): + return ExtElem(-f.rep, f.ext) + + def _get_rep(f, g): + if isinstance(g, ExtElem): + if g.ext == f.ext: + return g.rep + else: + return None + else: + try: + g = f.ext.convert(g) + return g.rep + except CoercionFailed: + return None + + def __add__(f, g): + rep = f._get_rep(g) + if rep is not None: + return ExtElem(f.rep + rep, f.ext) + else: + return NotImplemented + + __radd__ = __add__ + + def __sub__(f, g): + rep = f._get_rep(g) + if rep is not None: + return ExtElem(f.rep - rep, f.ext) + else: + return NotImplemented + + def __rsub__(f, g): + rep = f._get_rep(g) + if rep is not None: + return ExtElem(rep - f.rep, f.ext) + else: + return NotImplemented + + def __mul__(f, g): + rep = f._get_rep(g) + if rep is not None: + return ExtElem((f.rep * rep) % f.ext.mod, f.ext) + else: + return NotImplemented + + __rmul__ = __mul__ + + def _divcheck(f): + """Raise if division is not implemented for this divisor""" + if not f: + raise NotInvertible('Zero divisor') + elif f.ext.is_Field: + return True + elif f.rep.is_ground and f.ext.domain.is_unit(f.rep.LC()): + return True + else: + # Some cases like (2*x + 2)/2 over ZZ will fail here. It is + # unclear how to implement division in general if the ground + # domain is not a field so for now it was decided to restrict the + # implementation to division by invertible constants. + msg = (f"Can not invert {f} in {f.ext}. " + "Only division by invertible constants is implemented.") + raise NotImplementedError(msg) + + def inverse(f): + """Multiplicative inverse. + + Raises + ====== + + NotInvertible + If the element is a zero divisor. + + """ + f._divcheck() + + if f.ext.is_Field: + invrep = f.rep.invert(f.ext.mod) + else: + R = f.ext.ring + invrep = R.exquo(R.one, f.rep) + + return ExtElem(invrep, f.ext) + + def __truediv__(f, g): + rep = f._get_rep(g) + if rep is None: + return NotImplemented + g = ExtElem(rep, f.ext) + + try: + ginv = g.inverse() + except NotInvertible: + raise ZeroDivisionError(f"{f} / {g}") + + return f * ginv + + __floordiv__ = __truediv__ + + def __rtruediv__(f, g): + try: + g = f.ext.convert(g) + except CoercionFailed: + return NotImplemented + return g / f + + __rfloordiv__ = __rtruediv__ + + def __mod__(f, g): + rep = f._get_rep(g) + if rep is None: + return NotImplemented + g = ExtElem(rep, f.ext) + + try: + g._divcheck() + except NotInvertible: + raise ZeroDivisionError(f"{f} % {g}") + + # Division where defined is always exact so there is no remainder + return f.ext.zero + + def __rmod__(f, g): + try: + g = f.ext.convert(g) + except CoercionFailed: + return NotImplemented + return g % f + + def __pow__(f, n): + if not isinstance(n, int): + raise TypeError("exponent of type 'int' expected") + if n < 0: + try: + f, n = f.inverse(), -n + except NotImplementedError: + raise ValueError("negative powers are not defined") + + b = f.rep + m = f.ext.mod + r = f.ext.one.rep + while n > 0: + if n % 2: + r = (r*b) % m + b = (b*b) % m + n //= 2 + + return ExtElem(r, f.ext) + + def __eq__(f, g): + if isinstance(g, ExtElem): + return f.rep == g.rep and f.ext == g.ext + else: + return NotImplemented + + def __ne__(f, g): + return not f == g + + def __hash__(f): + return hash((f.rep, f.ext)) + + def __str__(f): + from sympy.printing.str import sstr + return sstr(f.as_expr()) + + __repr__ = __str__ + + @property + def is_ground(f): + return f.rep.is_ground + + def to_ground(f): + [c] = f.rep.to_list() + return c + +ExtElem = ExtensionElement + + +class MonogenicFiniteExtension(Domain): + r""" + Finite extension generated by an integral element. + + The generator is defined by a monic univariate + polynomial derived from the argument ``mod``. + + A shorter alias is ``FiniteExtension``. + + Examples + ======== + + Quadratic integer ring $\mathbb{Z}[\sqrt2]$: + + >>> from sympy import Symbol, Poly + >>> from sympy.polys.agca.extensions import FiniteExtension + >>> x = Symbol('x') + >>> R = FiniteExtension(Poly(x**2 - 2)); R + ZZ[x]/(x**2 - 2) + >>> R.rank + 2 + >>> R(1 + x)*(3 - 2*x) + x - 1 + + Finite field $GF(5^3)$ defined by the primitive + polynomial $x^3 + x^2 + 2$ (over $\mathbb{Z}_5$). + + >>> F = FiniteExtension(Poly(x**3 + x**2 + 2, modulus=5)); F + GF(5)[x]/(x**3 + x**2 + 2) + >>> F.basis + (1, x, x**2) + >>> F(x + 3)/(x**2 + 2) + -2*x**2 + x + 2 + + Function field of an elliptic curve: + + >>> t = Symbol('t') + >>> FiniteExtension(Poly(t**2 - x**3 - x + 1, t, field=True)) + ZZ(x)[t]/(t**2 - x**3 - x + 1) + + """ + is_FiniteExtension = True + + dtype = ExtensionElement + + def __init__(self, mod): + if not (isinstance(mod, Poly) and mod.is_univariate): + raise TypeError("modulus must be a univariate Poly") + + # Using auto=True (default) potentially changes the ground domain to a + # field whereas auto=False raises if division is not exact. We'll let + # the caller decide whether or not they want to put the ground domain + # over a field. In most uses mod is already monic. + mod = mod.monic(auto=False) + + self.rank = mod.degree() + self.modulus = mod + self.mod = mod.rep # DMP representation + + self.domain = dom = mod.domain + self.ring = dom.old_poly_ring(*mod.gens) + + self.zero = self.convert(self.ring.zero) + self.one = self.convert(self.ring.one) + + gen = self.ring.gens[0] + self.symbol = self.ring.symbols[0] + self.generator = self.convert(gen) + self.basis = tuple(self.convert(gen**i) for i in range(self.rank)) + + # XXX: It might be necessary to check mod.is_irreducible here + self.is_Field = self.domain.is_Field + + def new(self, arg): + rep = self.ring.convert(arg) + return ExtElem(rep % self.mod, self) + + def __eq__(self, other): + if not isinstance(other, FiniteExtension): + return False + return self.modulus == other.modulus + + def __hash__(self): + return hash((self.__class__.__name__, self.modulus)) + + def __str__(self): + return "%s/(%s)" % (self.ring, self.modulus.as_expr()) + + __repr__ = __str__ + + @property + def has_CharacteristicZero(self): + return self.domain.has_CharacteristicZero + + def characteristic(self): + return self.domain.characteristic() + + def convert(self, f, base=None): + rep = self.ring.convert(f, base) + return ExtElem(rep % self.mod, self) + + def convert_from(self, f, base): + rep = self.ring.convert(f, base) + return ExtElem(rep % self.mod, self) + + def to_sympy(self, f): + return self.ring.to_sympy(f.rep) + + def from_sympy(self, f): + return self.convert(f) + + def set_domain(self, K): + mod = self.modulus.set_domain(K) + return self.__class__(mod) + + def drop(self, *symbols): + if self.symbol in symbols: + raise GeneratorsError('Can not drop generator from FiniteExtension') + K = self.domain.drop(*symbols) + return self.set_domain(K) + + def quo(self, f, g): + return self.exquo(f, g) + + def exquo(self, f, g): + rep = self.ring.exquo(f.rep, g.rep) + return ExtElem(rep % self.mod, self) + + def is_negative(self, a): + return False + + def is_unit(self, a): + if self.is_Field: + return bool(a) + elif a.is_ground: + return self.domain.is_unit(a.to_ground()) + +FiniteExtension = MonogenicFiniteExtension diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/homomorphisms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/homomorphisms.py new file mode 100644 index 0000000000000000000000000000000000000000..45e9549980a8848eee944000d321922576961a00 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/homomorphisms.py @@ -0,0 +1,691 @@ +""" +Computations with homomorphisms of modules and rings. + +This module implements classes for representing homomorphisms of rings and +their modules. Instead of instantiating the classes directly, you should use +the function ``homomorphism(from, to, matrix)`` to create homomorphism objects. +""" + + +from sympy.polys.agca.modules import (Module, FreeModule, QuotientModule, + SubModule, SubQuotientModule) +from sympy.polys.polyerrors import CoercionFailed + +# The main computational task for module homomorphisms is kernels. +# For this reason, the concrete classes are organised by domain module type. + + +class ModuleHomomorphism: + """ + Abstract base class for module homomoprhisms. Do not instantiate. + + Instead, use the ``homomorphism`` function: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> homomorphism(F, F, [[1, 0], [0, 1]]) + Matrix([ + [1, 0], : QQ[x]**2 -> QQ[x]**2 + [0, 1]]) + + Attributes: + + - ring - the ring over which we are considering modules + - domain - the domain module + - codomain - the codomain module + - _ker - cached kernel + - _img - cached image + + Non-implemented methods: + + - _kernel + - _image + - _restrict_domain + - _restrict_codomain + - _quotient_domain + - _quotient_codomain + - _apply + - _mul_scalar + - _compose + - _add + """ + + def __init__(self, domain, codomain): + if not isinstance(domain, Module): + raise TypeError('Source must be a module, got %s' % domain) + if not isinstance(codomain, Module): + raise TypeError('Target must be a module, got %s' % codomain) + if domain.ring != codomain.ring: + raise ValueError('Source and codomain must be over same ring, ' + 'got %s != %s' % (domain, codomain)) + self.domain = domain + self.codomain = codomain + self.ring = domain.ring + self._ker = None + self._img = None + + def kernel(self): + r""" + Compute the kernel of ``self``. + + That is, if ``self`` is the homomorphism `\phi: M \to N`, then compute + `ker(\phi) = \{x \in M | \phi(x) = 0\}`. This is a submodule of `M`. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> homomorphism(F, F, [[1, 0], [x, 0]]).kernel() + <[x, -1]> + """ + if self._ker is None: + self._ker = self._kernel() + return self._ker + + def image(self): + r""" + Compute the image of ``self``. + + That is, if ``self`` is the homomorphism `\phi: M \to N`, then compute + `im(\phi) = \{\phi(x) | x \in M \}`. This is a submodule of `N`. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> homomorphism(F, F, [[1, 0], [x, 0]]).image() == F.submodule([1, 0]) + True + """ + if self._img is None: + self._img = self._image() + return self._img + + def _kernel(self): + """Compute the kernel of ``self``.""" + raise NotImplementedError + + def _image(self): + """Compute the image of ``self``.""" + raise NotImplementedError + + def _restrict_domain(self, sm): + """Implementation of domain restriction.""" + raise NotImplementedError + + def _restrict_codomain(self, sm): + """Implementation of codomain restriction.""" + raise NotImplementedError + + def _quotient_domain(self, sm): + """Implementation of domain quotient.""" + raise NotImplementedError + + def _quotient_codomain(self, sm): + """Implementation of codomain quotient.""" + raise NotImplementedError + + def restrict_domain(self, sm): + """ + Return ``self``, with the domain restricted to ``sm``. + + Here ``sm`` has to be a submodule of ``self.domain``. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2 + [0, 0]]) + >>> h.restrict_domain(F.submodule([1, 0])) + Matrix([ + [1, x], : <[1, 0]> -> QQ[x]**2 + [0, 0]]) + + This is the same as just composing on the right with the submodule + inclusion: + + >>> h * F.submodule([1, 0]).inclusion_hom() + Matrix([ + [1, x], : <[1, 0]> -> QQ[x]**2 + [0, 0]]) + """ + if not self.domain.is_submodule(sm): + raise ValueError('sm must be a submodule of %s, got %s' + % (self.domain, sm)) + if sm == self.domain: + return self + return self._restrict_domain(sm) + + def restrict_codomain(self, sm): + """ + Return ``self``, with codomain restricted to to ``sm``. + + Here ``sm`` has to be a submodule of ``self.codomain`` containing the + image. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2 + [0, 0]]) + >>> h.restrict_codomain(F.submodule([1, 0])) + Matrix([ + [1, x], : QQ[x]**2 -> <[1, 0]> + [0, 0]]) + """ + if not sm.is_submodule(self.image()): + raise ValueError('the image %s must contain sm, got %s' + % (self.image(), sm)) + if sm == self.codomain: + return self + return self._restrict_codomain(sm) + + def quotient_domain(self, sm): + """ + Return ``self`` with domain replaced by ``domain/sm``. + + Here ``sm`` must be a submodule of ``self.kernel()``. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2 + [0, 0]]) + >>> h.quotient_domain(F.submodule([-x, 1])) + Matrix([ + [1, x], : QQ[x]**2/<[-x, 1]> -> QQ[x]**2 + [0, 0]]) + """ + if not self.kernel().is_submodule(sm): + raise ValueError('kernel %s must contain sm, got %s' % + (self.kernel(), sm)) + if sm.is_zero(): + return self + return self._quotient_domain(sm) + + def quotient_codomain(self, sm): + """ + Return ``self`` with codomain replaced by ``codomain/sm``. + + Here ``sm`` must be a submodule of ``self.codomain``. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2 + [0, 0]]) + >>> h.quotient_codomain(F.submodule([1, 1])) + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2/<[1, 1]> + [0, 0]]) + + This is the same as composing with the quotient map on the left: + + >>> (F/[(1, 1)]).quotient_hom() * h + Matrix([ + [1, x], : QQ[x]**2 -> QQ[x]**2/<[1, 1]> + [0, 0]]) + """ + if not self.codomain.is_submodule(sm): + raise ValueError('sm must be a submodule of codomain %s, got %s' + % (self.codomain, sm)) + if sm.is_zero(): + return self + return self._quotient_codomain(sm) + + def _apply(self, elem): + """Apply ``self`` to ``elem``.""" + raise NotImplementedError + + def __call__(self, elem): + return self.codomain.convert(self._apply(self.domain.convert(elem))) + + def _compose(self, oth): + """ + Compose ``self`` with ``oth``, that is, return the homomorphism + obtained by first applying then ``self``, then ``oth``. + + (This method is private since in this syntax, it is non-obvious which + homomorphism is executed first.) + """ + raise NotImplementedError + + def _mul_scalar(self, c): + """Scalar multiplication. ``c`` is guaranteed in self.ring.""" + raise NotImplementedError + + def _add(self, oth): + """ + Homomorphism addition. + ``oth`` is guaranteed to be a homomorphism with same domain/codomain. + """ + raise NotImplementedError + + def _check_hom(self, oth): + """Helper to check that oth is a homomorphism with same domain/codomain.""" + if not isinstance(oth, ModuleHomomorphism): + return False + return oth.domain == self.domain and oth.codomain == self.codomain + + def __mul__(self, oth): + if isinstance(oth, ModuleHomomorphism) and self.domain == oth.codomain: + return oth._compose(self) + try: + return self._mul_scalar(self.ring.convert(oth)) + except CoercionFailed: + return NotImplemented + + # NOTE: _compose will never be called from rmul + __rmul__ = __mul__ + + def __truediv__(self, oth): + try: + return self._mul_scalar(1/self.ring.convert(oth)) + except CoercionFailed: + return NotImplemented + + def __add__(self, oth): + if self._check_hom(oth): + return self._add(oth) + return NotImplemented + + def __sub__(self, oth): + if self._check_hom(oth): + return self._add(oth._mul_scalar(self.ring.convert(-1))) + return NotImplemented + + def is_injective(self): + """ + Return True if ``self`` is injective. + + That is, check if the elements of the domain are mapped to the same + codomain element. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h.is_injective() + False + >>> h.quotient_domain(h.kernel()).is_injective() + True + """ + return self.kernel().is_zero() + + def is_surjective(self): + """ + Return True if ``self`` is surjective. + + That is, check if every element of the codomain has at least one + preimage. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h.is_surjective() + False + >>> h.restrict_codomain(h.image()).is_surjective() + True + """ + return self.image() == self.codomain + + def is_isomorphism(self): + """ + Return True if ``self`` is an isomorphism. + + That is, check if every element of the codomain has precisely one + preimage. Equivalently, ``self`` is both injective and surjective. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h = h.restrict_codomain(h.image()) + >>> h.is_isomorphism() + False + >>> h.quotient_domain(h.kernel()).is_isomorphism() + True + """ + return self.is_injective() and self.is_surjective() + + def is_zero(self): + """ + Return True if ``self`` is a zero morphism. + + That is, check if every element of the domain is mapped to zero + under self. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> h = homomorphism(F, F, [[1, 0], [x, 0]]) + >>> h.is_zero() + False + >>> h.restrict_domain(F.submodule()).is_zero() + True + >>> h.quotient_codomain(h.image()).is_zero() + True + """ + return self.image().is_zero() + + def __eq__(self, oth): + try: + return (self - oth).is_zero() + except TypeError: + return False + + def __ne__(self, oth): + return not (self == oth) + + +class MatrixHomomorphism(ModuleHomomorphism): + r""" + Helper class for all homomoprhisms which are expressed via a matrix. + + That is, for such homomorphisms ``domain`` is contained in a module + generated by finitely many elements `e_1, \ldots, e_n`, so that the + homomorphism is determined uniquely by its action on the `e_i`. It + can thus be represented as a vector of elements of the codomain module, + or potentially a supermodule of the codomain module + (and hence conventionally as a matrix, if there is a similar interpretation + for elements of the codomain module). + + Note that this class does *not* assume that the `e_i` freely generate a + submodule, nor that ``domain`` is even all of this submodule. It exists + only to unify the interface. + + Do not instantiate. + + Attributes: + + - matrix - the list of images determining the homomorphism. + NOTE: the elements of matrix belong to either self.codomain or + self.codomain.container + + Still non-implemented methods: + + - kernel + - _apply + """ + + def __init__(self, domain, codomain, matrix): + ModuleHomomorphism.__init__(self, domain, codomain) + if len(matrix) != domain.rank: + raise ValueError('Need to provide %s elements, got %s' + % (domain.rank, len(matrix))) + + converter = self.codomain.convert + if isinstance(self.codomain, (SubModule, SubQuotientModule)): + converter = self.codomain.container.convert + self.matrix = tuple(converter(x) for x in matrix) + + def _sympy_matrix(self): + """Helper function which returns a SymPy matrix ``self.matrix``.""" + from sympy.matrices import Matrix + c = lambda x: x + if isinstance(self.codomain, (QuotientModule, SubQuotientModule)): + c = lambda x: x.data + return Matrix([[self.ring.to_sympy(y) for y in c(x)] for x in self.matrix]).T + + def __repr__(self): + lines = repr(self._sympy_matrix()).split('\n') + t = " : %s -> %s" % (self.domain, self.codomain) + s = ' '*len(t) + n = len(lines) + for i in range(n // 2): + lines[i] += s + lines[n // 2] += t + for i in range(n//2 + 1, n): + lines[i] += s + return '\n'.join(lines) + + def _restrict_domain(self, sm): + """Implementation of domain restriction.""" + return SubModuleHomomorphism(sm, self.codomain, self.matrix) + + def _restrict_codomain(self, sm): + """Implementation of codomain restriction.""" + return self.__class__(self.domain, sm, self.matrix) + + def _quotient_domain(self, sm): + """Implementation of domain quotient.""" + return self.__class__(self.domain/sm, self.codomain, self.matrix) + + def _quotient_codomain(self, sm): + """Implementation of codomain quotient.""" + Q = self.codomain/sm + converter = Q.convert + if isinstance(self.codomain, SubModule): + converter = Q.container.convert + return self.__class__(self.domain, self.codomain/sm, + [converter(x) for x in self.matrix]) + + def _add(self, oth): + return self.__class__(self.domain, self.codomain, + [x + y for x, y in zip(self.matrix, oth.matrix)]) + + def _mul_scalar(self, c): + return self.__class__(self.domain, self.codomain, [c*x for x in self.matrix]) + + def _compose(self, oth): + return self.__class__(self.domain, oth.codomain, [oth(x) for x in self.matrix]) + + +class FreeModuleHomomorphism(MatrixHomomorphism): + """ + Concrete class for homomorphisms with domain a free module or a quotient + thereof. + + Do not instantiate; the constructor does not check that your data is well + defined. Use the ``homomorphism`` function instead: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> homomorphism(F, F, [[1, 0], [0, 1]]) + Matrix([ + [1, 0], : QQ[x]**2 -> QQ[x]**2 + [0, 1]]) + """ + + def _apply(self, elem): + if isinstance(self.domain, QuotientModule): + elem = elem.data + return sum(x * e for x, e in zip(elem, self.matrix)) + + def _image(self): + return self.codomain.submodule(*self.matrix) + + def _kernel(self): + # The domain is either a free module or a quotient thereof. + # It does not matter if it is a quotient, because that won't increase + # the kernel. + # Our generators {e_i} are sent to the matrix entries {b_i}. + # The kernel is essentially the syzygy module of these {b_i}. + syz = self.image().syzygy_module() + return self.domain.submodule(*syz.gens) + + +class SubModuleHomomorphism(MatrixHomomorphism): + """ + Concrete class for homomorphism with domain a submodule of a free module + or a quotient thereof. + + Do not instantiate; the constructor does not check that your data is well + defined. Use the ``homomorphism`` function instead: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> M = QQ.old_poly_ring(x).free_module(2)*x + >>> homomorphism(M, M, [[1, 0], [0, 1]]) + Matrix([ + [1, 0], : <[x, 0], [0, x]> -> <[x, 0], [0, x]> + [0, 1]]) + """ + + def _apply(self, elem): + if isinstance(self.domain, SubQuotientModule): + elem = elem.data + return sum(x * e for x, e in zip(elem, self.matrix)) + + def _image(self): + return self.codomain.submodule(*[self(x) for x in self.domain.gens]) + + def _kernel(self): + syz = self.image().syzygy_module() + return self.domain.submodule( + *[sum(xi*gi for xi, gi in zip(s, self.domain.gens)) + for s in syz.gens]) + + +def homomorphism(domain, codomain, matrix): + r""" + Create a homomorphism object. + + This function tries to build a homomorphism from ``domain`` to ``codomain`` + via the matrix ``matrix``. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> from sympy.polys.agca import homomorphism + + >>> R = QQ.old_poly_ring(x) + >>> T = R.free_module(2) + + If ``domain`` is a free module generated by `e_1, \ldots, e_n`, then + ``matrix`` should be an n-element iterable `(b_1, \ldots, b_n)` where + the `b_i` are elements of ``codomain``. The constructed homomorphism is the + unique homomorphism sending `e_i` to `b_i`. + + >>> F = R.free_module(2) + >>> h = homomorphism(F, T, [[1, x], [x**2, 0]]) + >>> h + Matrix([ + [1, x**2], : QQ[x]**2 -> QQ[x]**2 + [x, 0]]) + >>> h([1, 0]) + [1, x] + >>> h([0, 1]) + [x**2, 0] + >>> h([1, 1]) + [x**2 + 1, x] + + If ``domain`` is a submodule of a free module, them ``matrix`` determines + a homomoprhism from the containing free module to ``codomain``, and the + homomorphism returned is obtained by restriction to ``domain``. + + >>> S = F.submodule([1, 0], [0, x]) + >>> homomorphism(S, T, [[1, x], [x**2, 0]]) + Matrix([ + [1, x**2], : <[1, 0], [0, x]> -> QQ[x]**2 + [x, 0]]) + + If ``domain`` is a (sub)quotient `N/K`, then ``matrix`` determines a + homomorphism from `N` to ``codomain``. If the kernel contains `K`, this + homomorphism descends to ``domain`` and is returned; otherwise an exception + is raised. + + >>> homomorphism(S/[(1, 0)], T, [0, [x**2, 0]]) + Matrix([ + [0, x**2], : <[1, 0] + <[1, 0]>, [0, x] + <[1, 0]>, [1, 0] + <[1, 0]>> -> QQ[x]**2 + [0, 0]]) + >>> homomorphism(S/[(0, x)], T, [0, [x**2, 0]]) + Traceback (most recent call last): + ... + ValueError: kernel <[1, 0], [0, 0]> must contain sm, got <[0,x]> + + """ + def freepres(module): + """ + Return a tuple ``(F, S, Q, c)`` where ``F`` is a free module, ``S`` is a + submodule of ``F``, and ``Q`` a submodule of ``S``, such that + ``module = S/Q``, and ``c`` is a conversion function. + """ + if isinstance(module, FreeModule): + return module, module, module.submodule(), lambda x: module.convert(x) + if isinstance(module, QuotientModule): + return (module.base, module.base, module.killed_module, + lambda x: module.convert(x).data) + if isinstance(module, SubQuotientModule): + return (module.base.container, module.base, module.killed_module, + lambda x: module.container.convert(x).data) + # an ordinary submodule + return (module.container, module, module.submodule(), + lambda x: module.container.convert(x)) + + SF, SS, SQ, _ = freepres(domain) + TF, TS, TQ, c = freepres(codomain) + # NOTE this is probably a bit inefficient (redundant checks) + return FreeModuleHomomorphism(SF, TF, [c(x) for x in matrix] + ).restrict_domain(SS).restrict_codomain(TS + ).quotient_codomain(TQ).quotient_domain(SQ) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/ideals.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/ideals.py new file mode 100644 index 0000000000000000000000000000000000000000..1969554a1d674bc36ded1a3e312d587c66104086 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/ideals.py @@ -0,0 +1,395 @@ +"""Computations with ideals of polynomial rings.""" + +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.polyutils import IntegerPowerable + + +class Ideal(IntegerPowerable): + """ + Abstract base class for ideals. + + Do not instantiate - use explicit constructors in the ring class instead: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> QQ.old_poly_ring(x).ideal(x+1) + + + Attributes + + - ring - the ring this ideal belongs to + + Non-implemented methods: + + - _contains_elem + - _contains_ideal + - _quotient + - _intersect + - _union + - _product + - is_whole_ring + - is_zero + - is_prime, is_maximal, is_primary, is_radical + - is_principal + - height, depth + - radical + + Methods that likely should be overridden in subclasses: + + - reduce_element + """ + + def _contains_elem(self, x): + """Implementation of element containment.""" + raise NotImplementedError + + def _contains_ideal(self, I): + """Implementation of ideal containment.""" + raise NotImplementedError + + def _quotient(self, J): + """Implementation of ideal quotient.""" + raise NotImplementedError + + def _intersect(self, J): + """Implementation of ideal intersection.""" + raise NotImplementedError + + def is_whole_ring(self): + """Return True if ``self`` is the whole ring.""" + raise NotImplementedError + + def is_zero(self): + """Return True if ``self`` is the zero ideal.""" + raise NotImplementedError + + def _equals(self, J): + """Implementation of ideal equality.""" + return self._contains_ideal(J) and J._contains_ideal(self) + + def is_prime(self): + """Return True if ``self`` is a prime ideal.""" + raise NotImplementedError + + def is_maximal(self): + """Return True if ``self`` is a maximal ideal.""" + raise NotImplementedError + + def is_radical(self): + """Return True if ``self`` is a radical ideal.""" + raise NotImplementedError + + def is_primary(self): + """Return True if ``self`` is a primary ideal.""" + raise NotImplementedError + + def is_principal(self): + """Return True if ``self`` is a principal ideal.""" + raise NotImplementedError + + def radical(self): + """Compute the radical of ``self``.""" + raise NotImplementedError + + def depth(self): + """Compute the depth of ``self``.""" + raise NotImplementedError + + def height(self): + """Compute the height of ``self``.""" + raise NotImplementedError + + # TODO more + + # non-implemented methods end here + + def __init__(self, ring): + self.ring = ring + + def _check_ideal(self, J): + """Helper to check ``J`` is an ideal of our ring.""" + if not isinstance(J, Ideal) or J.ring != self.ring: + raise ValueError( + 'J must be an ideal of %s, got %s' % (self.ring, J)) + + def contains(self, elem): + """ + Return True if ``elem`` is an element of this ideal. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).ideal(x+1, x-1).contains(3) + True + >>> QQ.old_poly_ring(x).ideal(x**2, x**3).contains(x) + False + """ + return self._contains_elem(self.ring.convert(elem)) + + def subset(self, other): + """ + Returns True if ``other`` is is a subset of ``self``. + + Here ``other`` may be an ideal. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> I = QQ.old_poly_ring(x).ideal(x+1) + >>> I.subset([x**2 - 1, x**2 + 2*x + 1]) + True + >>> I.subset([x**2 + 1, x + 1]) + False + >>> I.subset(QQ.old_poly_ring(x).ideal(x**2 - 1)) + True + """ + if isinstance(other, Ideal): + return self._contains_ideal(other) + return all(self._contains_elem(x) for x in other) + + def quotient(self, J, **opts): + r""" + Compute the ideal quotient of ``self`` by ``J``. + + That is, if ``self`` is the ideal `I`, compute the set + `I : J = \{x \in R | xJ \subset I \}`. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> R = QQ.old_poly_ring(x, y) + >>> R.ideal(x*y).quotient(R.ideal(x)) + + """ + self._check_ideal(J) + return self._quotient(J, **opts) + + def intersect(self, J): + """ + Compute the intersection of self with ideal J. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> R = QQ.old_poly_ring(x, y) + >>> R.ideal(x).intersect(R.ideal(y)) + + """ + self._check_ideal(J) + return self._intersect(J) + + def saturate(self, J): + r""" + Compute the ideal saturation of ``self`` by ``J``. + + That is, if ``self`` is the ideal `I`, compute the set + `I : J^\infty = \{x \in R | xJ^n \subset I \text{ for some } n\}`. + """ + raise NotImplementedError + # Note this can be implemented using repeated quotient + + def union(self, J): + """ + Compute the ideal generated by the union of ``self`` and ``J``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).ideal(x**2 - 1).union(QQ.old_poly_ring(x).ideal((x+1)**2)) == QQ.old_poly_ring(x).ideal(x+1) + True + """ + self._check_ideal(J) + return self._union(J) + + def product(self, J): + r""" + Compute the ideal product of ``self`` and ``J``. + + That is, compute the ideal generated by products `xy`, for `x` an element + of ``self`` and `y \in J`. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> QQ.old_poly_ring(x, y).ideal(x).product(QQ.old_poly_ring(x, y).ideal(y)) + + """ + self._check_ideal(J) + return self._product(J) + + def reduce_element(self, x): + """ + Reduce the element ``x`` of our ring modulo the ideal ``self``. + + Here "reduce" has no specific meaning: it could return a unique normal + form, simplify the expression a bit, or just do nothing. + """ + return x + + def __add__(self, e): + if not isinstance(e, Ideal): + R = self.ring.quotient_ring(self) + if isinstance(e, R.dtype): + return e + if isinstance(e, R.ring.dtype): + return R(e) + return R.convert(e) + self._check_ideal(e) + return self.union(e) + + __radd__ = __add__ + + def __mul__(self, e): + if not isinstance(e, Ideal): + try: + e = self.ring.ideal(e) + except CoercionFailed: + return NotImplemented + self._check_ideal(e) + return self.product(e) + + __rmul__ = __mul__ + + def _zeroth_power(self): + return self.ring.ideal(1) + + def _first_power(self): + # Raising to any power but 1 returns a new instance. So we mult by 1 + # here so that the first power is no exception. + return self * 1 + + def __eq__(self, e): + if not isinstance(e, Ideal) or e.ring != self.ring: + return False + return self._equals(e) + + def __ne__(self, e): + return not (self == e) + + +class ModuleImplementedIdeal(Ideal): + """ + Ideal implementation relying on the modules code. + + Attributes: + + - _module - the underlying module + """ + + def __init__(self, ring, module): + Ideal.__init__(self, ring) + self._module = module + + def _contains_elem(self, x): + return self._module.contains([x]) + + def _contains_ideal(self, J): + if not isinstance(J, ModuleImplementedIdeal): + raise NotImplementedError + return self._module.is_submodule(J._module) + + def _intersect(self, J): + if not isinstance(J, ModuleImplementedIdeal): + raise NotImplementedError + return self.__class__(self.ring, self._module.intersect(J._module)) + + def _quotient(self, J, **opts): + if not isinstance(J, ModuleImplementedIdeal): + raise NotImplementedError + return self._module.module_quotient(J._module, **opts) + + def _union(self, J): + if not isinstance(J, ModuleImplementedIdeal): + raise NotImplementedError + return self.__class__(self.ring, self._module.union(J._module)) + + @property + def gens(self): + """ + Return generators for ``self``. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x, y + >>> list(QQ.old_poly_ring(x, y).ideal(x, y, x**2 + y).gens) + [DMP_Python([[1], []], QQ), DMP_Python([[1, 0]], QQ), DMP_Python([[1], [], [1, 0]], QQ)] + """ + return (x[0] for x in self._module.gens) + + def is_zero(self): + """ + Return True if ``self`` is the zero ideal. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).ideal(x).is_zero() + False + >>> QQ.old_poly_ring(x).ideal().is_zero() + True + """ + return self._module.is_zero() + + def is_whole_ring(self): + """ + Return True if ``self`` is the whole ring, i.e. one generator is a unit. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ, ilex + >>> QQ.old_poly_ring(x).ideal(x).is_whole_ring() + False + >>> QQ.old_poly_ring(x).ideal(3).is_whole_ring() + True + >>> QQ.old_poly_ring(x, order=ilex).ideal(2 + x).is_whole_ring() + True + """ + return self._module.is_full_module() + + def __repr__(self): + from sympy.printing.str import sstr + gens = [self.ring.to_sympy(x) for [x] in self._module.gens] + return '<' + ','.join(sstr(g) for g in gens) + '>' + + # NOTE this is the only method using the fact that the module is a SubModule + def _product(self, J): + if not isinstance(J, ModuleImplementedIdeal): + raise NotImplementedError + return self.__class__(self.ring, self._module.submodule( + *[[x*y] for [x] in self._module.gens for [y] in J._module.gens])) + + def in_terms_of_generators(self, e): + """ + Express ``e`` in terms of the generators of ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> I = QQ.old_poly_ring(x).ideal(x**2 + 1, x) + >>> I.in_terms_of_generators(1) # doctest: +SKIP + [DMP_Python([1], QQ), DMP_Python([-1, 0], QQ)] + """ + return self._module.in_terms_of_generators([e]) + + def reduce_element(self, x, **options): + return self._module.reduce_element([x], **options)[0] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/modules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/modules.py new file mode 100644 index 0000000000000000000000000000000000000000..0a2e2ed814f4143b4b49f8b1f10c2a07cb32d06a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/modules.py @@ -0,0 +1,1488 @@ +""" +Computations with modules over polynomial rings. + +This module implements various classes that encapsulate groebner basis +computations for modules. Most of them should not be instantiated by hand. +Instead, use the constructing routines on objects you already have. + +For example, to construct a free module over ``QQ[x, y]``, call +``QQ[x, y].free_module(rank)`` instead of the ``FreeModule`` constructor. +In fact ``FreeModule`` is an abstract base class that should not be +instantiated, the ``free_module`` method instead returns the implementing class +``FreeModulePolyRing``. + +In general, the abstract base classes implement most functionality in terms of +a few non-implemented methods. The concrete base classes supply only these +non-implemented methods. They may also supply new implementations of the +convenience methods, for example if there are faster algorithms available. +""" + + +from copy import copy +from functools import reduce + +from sympy.polys.agca.ideals import Ideal +from sympy.polys.domains.field import Field +from sympy.polys.orderings import ProductOrder, monomial_key +from sympy.polys.polyclasses import DMP +from sympy.polys.polyerrors import CoercionFailed +from sympy.core.basic import _aresame +from sympy.utilities.iterables import iterable + +# TODO +# - module saturation +# - module quotient/intersection for quotient rings +# - free resoltutions / syzygies +# - finding small/minimal generating sets +# - ... + +########################################################################## +## Abstract base classes ################################################# +########################################################################## + + +class Module: + """ + Abstract base class for modules. + + Do not instantiate - use ring explicit constructors instead: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> QQ.old_poly_ring(x).free_module(2) + QQ[x]**2 + + Attributes: + + - dtype - type of elements + - ring - containing ring + + Non-implemented methods: + + - submodule + - quotient_module + - is_zero + - is_submodule + - multiply_ideal + + The method convert likely needs to be changed in subclasses. + """ + + def __init__(self, ring): + self.ring = ring + + def convert(self, elem, M=None): + """ + Convert ``elem`` into internal representation of this module. + + If ``M`` is not None, it should be a module containing it. + """ + if not isinstance(elem, self.dtype): + raise CoercionFailed + return elem + + def submodule(self, *gens): + """Generate a submodule.""" + raise NotImplementedError + + def quotient_module(self, other): + """Generate a quotient module.""" + raise NotImplementedError + + def __truediv__(self, e): + if not isinstance(e, Module): + e = self.submodule(*e) + return self.quotient_module(e) + + def contains(self, elem): + """Return True if ``elem`` is an element of this module.""" + try: + self.convert(elem) + return True + except CoercionFailed: + return False + + def __contains__(self, elem): + return self.contains(elem) + + def subset(self, other): + """ + Returns True if ``other`` is is a subset of ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.subset([(1, x), (x, 2)]) + True + >>> F.subset([(1/x, x), (x, 2)]) + False + """ + return all(self.contains(x) for x in other) + + def __eq__(self, other): + return self.is_submodule(other) and other.is_submodule(self) + + def __ne__(self, other): + return not (self == other) + + def is_zero(self): + """Returns True if ``self`` is a zero module.""" + raise NotImplementedError + + def is_submodule(self, other): + """Returns True if ``other`` is a submodule of ``self``.""" + raise NotImplementedError + + def multiply_ideal(self, other): + """ + Multiply ``self`` by the ideal ``other``. + """ + raise NotImplementedError + + def __mul__(self, e): + if not isinstance(e, Ideal): + try: + e = self.ring.ideal(e) + except (CoercionFailed, NotImplementedError): + return NotImplemented + return self.multiply_ideal(e) + + __rmul__ = __mul__ + + def identity_hom(self): + """Return the identity homomorphism on ``self``.""" + raise NotImplementedError + + +class ModuleElement: + """ + Base class for module element wrappers. + + Use this class to wrap primitive data types as module elements. It stores + a reference to the containing module, and implements all the arithmetic + operators. + + Attributes: + + - module - containing module + - data - internal data + + Methods that likely need change in subclasses: + + - add + - mul + - div + - eq + """ + + def __init__(self, module, data): + self.module = module + self.data = data + + def add(self, d1, d2): + """Add data ``d1`` and ``d2``.""" + return d1 + d2 + + def mul(self, m, d): + """Multiply module data ``m`` by coefficient d.""" + return m * d + + def div(self, m, d): + """Divide module data ``m`` by coefficient d.""" + return m / d + + def eq(self, d1, d2): + """Return true if d1 and d2 represent the same element.""" + return d1 == d2 + + def __add__(self, om): + if not isinstance(om, self.__class__) or om.module != self.module: + try: + om = self.module.convert(om) + except CoercionFailed: + return NotImplemented + return self.__class__(self.module, self.add(self.data, om.data)) + + __radd__ = __add__ + + def __neg__(self): + return self.__class__(self.module, self.mul(self.data, + self.module.ring.convert(-1))) + + def __sub__(self, om): + if not isinstance(om, self.__class__) or om.module != self.module: + try: + om = self.module.convert(om) + except CoercionFailed: + return NotImplemented + return self.__add__(-om) + + def __rsub__(self, om): + return (-self).__add__(om) + + def __mul__(self, o): + if not isinstance(o, self.module.ring.dtype): + try: + o = self.module.ring.convert(o) + except CoercionFailed: + return NotImplemented + return self.__class__(self.module, self.mul(self.data, o)) + + __rmul__ = __mul__ + + def __truediv__(self, o): + if not isinstance(o, self.module.ring.dtype): + try: + o = self.module.ring.convert(o) + except CoercionFailed: + return NotImplemented + return self.__class__(self.module, self.div(self.data, o)) + + def __eq__(self, om): + if not isinstance(om, self.__class__) or om.module != self.module: + try: + om = self.module.convert(om) + except CoercionFailed: + return False + return self.eq(self.data, om.data) + + def __ne__(self, om): + return not self == om + +########################################################################## +## Free Modules ########################################################## +########################################################################## + + +class FreeModuleElement(ModuleElement): + """Element of a free module. Data stored as a tuple.""" + + def add(self, d1, d2): + return tuple(x + y for x, y in zip(d1, d2)) + + def mul(self, d, p): + return tuple(x * p for x in d) + + def div(self, d, p): + return tuple(x / p for x in d) + + def __repr__(self): + from sympy.printing.str import sstr + data = self.data + if any(isinstance(x, DMP) for x in data): + data = [self.module.ring.to_sympy(x) for x in data] + return '[' + ', '.join(sstr(x) for x in data) + ']' + + def __iter__(self): + return self.data.__iter__() + + def __getitem__(self, idx): + return self.data[idx] + + +class FreeModule(Module): + """ + Abstract base class for free modules. + + Additional attributes: + + - rank - rank of the free module + + Non-implemented methods: + + - submodule + """ + + dtype = FreeModuleElement + + def __init__(self, ring, rank): + Module.__init__(self, ring) + self.rank = rank + + def __repr__(self): + return repr(self.ring) + "**" + repr(self.rank) + + def is_submodule(self, other): + """ + Returns True if ``other`` is a submodule of ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> M = F.submodule([2, x]) + >>> F.is_submodule(F) + True + >>> F.is_submodule(M) + True + >>> M.is_submodule(F) + False + """ + if isinstance(other, SubModule): + return other.container == self + if isinstance(other, FreeModule): + return other.ring == self.ring and other.rank == self.rank + return False + + def convert(self, elem, M=None): + """ + Convert ``elem`` into the internal representation. + + This method is called implicitly whenever computations involve elements + not in the internal representation. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.convert([1, 0]) + [1, 0] + """ + if isinstance(elem, FreeModuleElement): + if elem.module is self: + return elem + if elem.module.rank != self.rank: + raise CoercionFailed + return FreeModuleElement(self, + tuple(self.ring.convert(x, elem.module.ring) for x in elem.data)) + elif iterable(elem): + tpl = tuple(self.ring.convert(x) for x in elem) + if len(tpl) != self.rank: + raise CoercionFailed + return FreeModuleElement(self, tpl) + elif _aresame(elem, 0): + return FreeModuleElement(self, (self.ring.convert(0),)*self.rank) + else: + raise CoercionFailed + + def is_zero(self): + """ + Returns True if ``self`` is a zero module. + + (If, as this implementation assumes, the coefficient ring is not the + zero ring, then this is equivalent to the rank being zero.) + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(0).is_zero() + True + >>> QQ.old_poly_ring(x).free_module(1).is_zero() + False + """ + return self.rank == 0 + + def basis(self): + """ + Return a set of basis elements. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(3).basis() + ([1, 0, 0], [0, 1, 0], [0, 0, 1]) + """ + from sympy.matrices import eye + M = eye(self.rank) + return tuple(self.convert(M.row(i)) for i in range(self.rank)) + + def quotient_module(self, submodule): + """ + Return a quotient module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x).free_module(2) + >>> M.quotient_module(M.submodule([1, x], [x, 2])) + QQ[x]**2/<[1, x], [x, 2]> + + Or more conicisely, using the overloaded division operator: + + >>> QQ.old_poly_ring(x).free_module(2) / [[1, x], [x, 2]] + QQ[x]**2/<[1, x], [x, 2]> + """ + return QuotientModule(self.ring, self, submodule) + + def multiply_ideal(self, other): + """ + Multiply ``self`` by the ideal ``other``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> I = QQ.old_poly_ring(x).ideal(x) + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.multiply_ideal(I) + <[x, 0], [0, x]> + """ + return self.submodule(*self.basis()).multiply_ideal(other) + + def identity_hom(self): + """ + Return the identity homomorphism on ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2).identity_hom() + Matrix([ + [1, 0], : QQ[x]**2 -> QQ[x]**2 + [0, 1]]) + """ + from sympy.polys.agca.homomorphisms import homomorphism + return homomorphism(self, self, self.basis()) + + +class FreeModulePolyRing(FreeModule): + """ + Free module over a generalized polynomial ring. + + Do not instantiate this, use the constructor method of the ring instead: + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(3) + >>> F + QQ[x]**3 + >>> F.contains([x, 1, 0]) + True + >>> F.contains([1/x, 0, 1]) + False + """ + + def __init__(self, ring, rank): + from sympy.polys.domains.old_polynomialring import PolynomialRingBase + FreeModule.__init__(self, ring, rank) + if not isinstance(ring, PolynomialRingBase): + raise NotImplementedError('This implementation only works over ' + + 'polynomial rings, got %s' % ring) + if not isinstance(ring.dom, Field): + raise NotImplementedError('Ground domain must be a field, ' + + 'got %s' % ring.dom) + + def submodule(self, *gens, **opts): + """ + Generate a submodule. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x, y).free_module(2).submodule([x, x + y]) + >>> M + <[x, x + y]> + >>> M.contains([2*x, 2*x + 2*y]) + True + >>> M.contains([x, y]) + False + """ + return SubModulePolyRing(gens, self, **opts) + + +class FreeModuleQuotientRing(FreeModule): + """ + Free module over a quotient ring. + + Do not instantiate this, use the constructor method of the ring instead: + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = (QQ.old_poly_ring(x)/[x**2 + 1]).free_module(3) + >>> F + (QQ[x]/)**3 + + Attributes + + - quot - the quotient module `R^n / IR^n`, where `R/I` is our ring + """ + + def __init__(self, ring, rank): + from sympy.polys.domains.quotientring import QuotientRing + FreeModule.__init__(self, ring, rank) + if not isinstance(ring, QuotientRing): + raise NotImplementedError('This implementation only works over ' + + 'quotient rings, got %s' % ring) + F = self.ring.ring.free_module(self.rank) + self.quot = F / (self.ring.base_ideal*F) + + def __repr__(self): + return "(" + repr(self.ring) + ")" + "**" + repr(self.rank) + + def submodule(self, *gens, **opts): + """ + Generate a submodule. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> M = (QQ.old_poly_ring(x, y)/[x**2 - y**2]).free_module(2).submodule([x, x + y]) + >>> M + <[x + , x + y + ]> + >>> M.contains([y**2, x**2 + x*y]) + True + >>> M.contains([x, y]) + False + """ + return SubModuleQuotientRing(gens, self, **opts) + + def lift(self, elem): + """ + Lift the element ``elem`` of self to the module self.quot. + + Note that self.quot is the same set as self, just as an R-module + and not as an R/I-module, so this makes sense. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = (QQ.old_poly_ring(x)/[x**2 + 1]).free_module(2) + >>> e = F.convert([1, 0]) + >>> e + [1 + , 0 + ] + >>> L = F.quot + >>> l = F.lift(e) + >>> l + [1, 0] + <[x**2 + 1, 0], [0, x**2 + 1]> + >>> L.contains(l) + True + """ + return self.quot.convert([x.data for x in elem]) + + def unlift(self, elem): + """ + Push down an element of self.quot to self. + + This undoes ``lift``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = (QQ.old_poly_ring(x)/[x**2 + 1]).free_module(2) + >>> e = F.convert([1, 0]) + >>> l = F.lift(e) + >>> e == l + False + >>> e == F.unlift(l) + True + """ + return self.convert(elem.data) + +########################################################################## +## Submodules and subquotients ########################################### +########################################################################## + + +class SubModule(Module): + """ + Base class for submodules. + + Attributes: + + - container - containing module + - gens - generators (subset of containing module) + - rank - rank of containing module + + Non-implemented methods: + + - _contains + - _syzygies + - _in_terms_of_generators + - _intersect + - _module_quotient + + Methods that likely need change in subclasses: + + - reduce_element + """ + + def __init__(self, gens, container): + Module.__init__(self, container.ring) + self.gens = tuple(container.convert(x) for x in gens) + self.container = container + self.rank = container.rank + self.ring = container.ring + self.dtype = container.dtype + + def __repr__(self): + return "<" + ", ".join(repr(x) for x in self.gens) + ">" + + def _contains(self, other): + """Implementation of containment. + Other is guaranteed to be FreeModuleElement.""" + raise NotImplementedError + + def _syzygies(self): + """Implementation of syzygy computation wrt self generators.""" + raise NotImplementedError + + def _in_terms_of_generators(self, e): + """Implementation of expression in terms of generators.""" + raise NotImplementedError + + def convert(self, elem, M=None): + """ + Convert ``elem`` into the internal represantition. + + Mostly called implicitly. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x).free_module(2).submodule([1, x]) + >>> M.convert([2, 2*x]) + [2, 2*x] + """ + if isinstance(elem, self.container.dtype) and elem.module is self: + return elem + r = copy(self.container.convert(elem, M)) + r.module = self + if not self._contains(r): + raise CoercionFailed + return r + + def _intersect(self, other): + """Implementation of intersection. + Other is guaranteed to be a submodule of same free module.""" + raise NotImplementedError + + def _module_quotient(self, other): + """Implementation of quotient. + Other is guaranteed to be a submodule of same free module.""" + raise NotImplementedError + + def intersect(self, other, **options): + """ + Returns the intersection of ``self`` with submodule ``other``. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x, y).free_module(2) + >>> F.submodule([x, x]).intersect(F.submodule([y, y])) + <[x*y, x*y]> + + Some implementation allow further options to be passed. Currently, to + only one implemented is ``relations=True``, in which case the function + will return a triple ``(res, rela, relb)``, where ``res`` is the + intersection module, and ``rela`` and ``relb`` are lists of coefficient + vectors, expressing the generators of ``res`` in terms of the + generators of ``self`` (``rela``) and ``other`` (``relb``). + + >>> F.submodule([x, x]).intersect(F.submodule([y, y]), relations=True) + (<[x*y, x*y]>, [(DMP_Python([[1, 0]], QQ),)], [(DMP_Python([[1], []], QQ),)]) + + The above result says: the intersection module is generated by the + single element `(-xy, -xy) = -y (x, x) = -x (y, y)`, where + `(x, x)` and `(y, y)` respectively are the unique generators of + the two modules being intersected. + """ + if not isinstance(other, SubModule): + raise TypeError('%s is not a SubModule' % other) + if other.container != self.container: + raise ValueError( + '%s is contained in a different free module' % other) + return self._intersect(other, **options) + + def module_quotient(self, other, **options): + r""" + Returns the module quotient of ``self`` by submodule ``other``. + + That is, if ``self`` is the module `M` and ``other`` is `N`, then + return the ideal `\{f \in R | fN \subset M\}`. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.abc import x, y + >>> F = QQ.old_poly_ring(x, y).free_module(2) + >>> S = F.submodule([x*y, x*y]) + >>> T = F.submodule([x, x]) + >>> S.module_quotient(T) + + + Some implementations allow further options to be passed. Currently, the + only one implemented is ``relations=True``, which may only be passed + if ``other`` is principal. In this case the function + will return a pair ``(res, rel)`` where ``res`` is the ideal, and + ``rel`` is a list of coefficient vectors, expressing the generators of + the ideal, multiplied by the generator of ``other`` in terms of + generators of ``self``. + + >>> S.module_quotient(T, relations=True) + (, [[DMP_Python([[1]], QQ)]]) + + This means that the quotient ideal is generated by the single element + `y`, and that `y (x, x) = 1 (xy, xy)`, `(x, x)` and `(xy, xy)` being + the generators of `T` and `S`, respectively. + """ + if not isinstance(other, SubModule): + raise TypeError('%s is not a SubModule' % other) + if other.container != self.container: + raise ValueError( + '%s is contained in a different free module' % other) + return self._module_quotient(other, **options) + + def union(self, other): + """ + Returns the module generated by the union of ``self`` and ``other``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(1) + >>> M = F.submodule([x**2 + x]) # + >>> N = F.submodule([x**2 - 1]) # <(x-1)(x+1)> + >>> M.union(N) == F.submodule([x+1]) + True + """ + if not isinstance(other, SubModule): + raise TypeError('%s is not a SubModule' % other) + if other.container != self.container: + raise ValueError( + '%s is contained in a different free module' % other) + return self.__class__(self.gens + other.gens, self.container) + + def is_zero(self): + """ + Return True if ``self`` is a zero module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.submodule([x, 1]).is_zero() + False + >>> F.submodule([0, 0]).is_zero() + True + """ + return all(x == 0 for x in self.gens) + + def submodule(self, *gens): + """ + Generate a submodule. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x).free_module(2).submodule([x, 1]) + >>> M.submodule([x**2, x]) + <[x**2, x]> + """ + if not self.subset(gens): + raise ValueError('%s not a subset of %s' % (gens, self)) + return self.__class__(gens, self.container) + + def is_full_module(self): + """ + Return True if ``self`` is the entire free module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.submodule([x, 1]).is_full_module() + False + >>> F.submodule([1, 1], [1, 2]).is_full_module() + True + """ + return all(self.contains(x) for x in self.container.basis()) + + def is_submodule(self, other): + """ + Returns True if ``other`` is a submodule of ``self``. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> M = F.submodule([2, x]) + >>> N = M.submodule([2*x, x**2]) + >>> M.is_submodule(M) + True + >>> M.is_submodule(N) + True + >>> N.is_submodule(M) + False + """ + if isinstance(other, SubModule): + return self.container == other.container and \ + all(self.contains(x) for x in other.gens) + if isinstance(other, (FreeModule, QuotientModule)): + return self.container == other and self.is_full_module() + return False + + def syzygy_module(self, **opts): + r""" + Compute the syzygy module of the generators of ``self``. + + Suppose `M` is generated by `f_1, \ldots, f_n` over the ring + `R`. Consider the homomorphism `\phi: R^n \to M`, given by + sending `(r_1, \ldots, r_n) \to r_1 f_1 + \cdots + r_n f_n`. + The syzygy module is defined to be the kernel of `\phi`. + + Examples + ======== + + The syzygy module is zero iff the generators generate freely a free + submodule: + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2).submodule([1, 0], [1, 1]).syzygy_module().is_zero() + True + + A slightly more interesting example: + + >>> M = QQ.old_poly_ring(x, y).free_module(2).submodule([x, 2*x], [y, 2*y]) + >>> S = QQ.old_poly_ring(x, y).free_module(2).submodule([y, -x]) + >>> M.syzygy_module() == S + True + """ + F = self.ring.free_module(len(self.gens)) + # NOTE we filter out zero syzygies. This is for convenience of the + # _syzygies function and not meant to replace any real "generating set + # reduction" algorithm + return F.submodule(*[x for x in self._syzygies() if F.convert(x) != 0], + **opts) + + def in_terms_of_generators(self, e): + """ + Express element ``e`` of ``self`` in terms of the generators. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> M = F.submodule([1, 0], [1, 1]) + >>> M.in_terms_of_generators([x, x**2]) # doctest: +SKIP + [DMP_Python([-1, 1, 0], QQ), DMP_Python([1, 0, 0], QQ)] + """ + try: + e = self.convert(e) + except CoercionFailed: + raise ValueError('%s is not an element of %s' % (e, self)) + return self._in_terms_of_generators(e) + + def reduce_element(self, x): + """ + Reduce the element ``x`` of our ring modulo the ideal ``self``. + + Here "reduce" has no specific meaning, it could return a unique normal + form, simplify the expression a bit, or just do nothing. + """ + return x + + def quotient_module(self, other, **opts): + """ + Return a quotient module. + + This is the same as taking a submodule of a quotient of the containing + module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> S1 = F.submodule([x, 1]) + >>> S2 = F.submodule([x**2, x]) + >>> S1.quotient_module(S2) + <[x, 1] + <[x**2, x]>> + + Or more coincisely, using the overloaded division operator: + + >>> F.submodule([x, 1]) / [(x**2, x)] + <[x, 1] + <[x**2, x]>> + """ + if not self.is_submodule(other): + raise ValueError('%s not a submodule of %s' % (other, self)) + return SubQuotientModule(self.gens, + self.container.quotient_module(other), **opts) + + def __add__(self, oth): + return self.container.quotient_module(self).convert(oth) + + __radd__ = __add__ + + def multiply_ideal(self, I): + """ + Multiply ``self`` by the ideal ``I``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> I = QQ.old_poly_ring(x).ideal(x**2) + >>> M = QQ.old_poly_ring(x).free_module(2).submodule([1, 1]) + >>> I*M + <[x**2, x**2]> + """ + return self.submodule(*[x*g for [x] in I._module.gens for g in self.gens]) + + def inclusion_hom(self): + """ + Return a homomorphism representing the inclusion map of ``self``. + + That is, the natural map from ``self`` to ``self.container``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2).submodule([x, x]).inclusion_hom() + Matrix([ + [1, 0], : <[x, x]> -> QQ[x]**2 + [0, 1]]) + """ + return self.container.identity_hom().restrict_domain(self) + + def identity_hom(self): + """ + Return the identity homomorphism on ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2).submodule([x, x]).identity_hom() + Matrix([ + [1, 0], : <[x, x]> -> <[x, x]> + [0, 1]]) + """ + return self.container.identity_hom().restrict_domain( + self).restrict_codomain(self) + + +class SubQuotientModule(SubModule): + """ + Submodule of a quotient module. + + Equivalently, quotient module of a submodule. + + Do not instantiate this, instead use the submodule or quotient_module + constructing methods: + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> S = F.submodule([1, 0], [1, x]) + >>> Q = F/[(1, 0)] + >>> S/[(1, 0)] == Q.submodule([5, x]) + True + + Attributes: + + - base - base module we are quotient of + - killed_module - submodule used to form the quotient + """ + def __init__(self, gens, container, **opts): + SubModule.__init__(self, gens, container) + self.killed_module = self.container.killed_module + # XXX it is important for some code below that the generators of base + # are in this particular order! + self.base = self.container.base.submodule( + *[x.data for x in self.gens], **opts).union(self.killed_module) + + def _contains(self, elem): + return self.base.contains(elem.data) + + def _syzygies(self): + # let N = self.killed_module be generated by e_1, ..., e_r + # let F = self.base be generated by f_1, ..., f_s and e_1, ..., e_r + # Then self = F/N. + # Let phi: R**s --> self be the evident surjection. + # Similarly psi: R**(s + r) --> F. + # We need to find generators for ker(phi). Let chi: R**s --> F be the + # evident lift of phi. For X in R**s, phi(X) = 0 iff chi(X) is + # contained in N, iff there exists Y in R**r such that + # psi(X, Y) = 0. + # Hence if alpha: R**(s + r) --> R**s is the projection map, then + # ker(phi) = alpha ker(psi). + return [X[:len(self.gens)] for X in self.base._syzygies()] + + def _in_terms_of_generators(self, e): + return self.base._in_terms_of_generators(e.data)[:len(self.gens)] + + def is_full_module(self): + """ + Return True if ``self`` is the entire free module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> F.submodule([x, 1]).is_full_module() + False + >>> F.submodule([1, 1], [1, 2]).is_full_module() + True + """ + return self.base.is_full_module() + + def quotient_hom(self): + """ + Return the quotient homomorphism to self. + + That is, return the natural map from ``self.base`` to ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = (QQ.old_poly_ring(x).free_module(2) / [(1, x)]).submodule([1, 0]) + >>> M.quotient_hom() + Matrix([ + [1, 0], : <[1, 0], [1, x]> -> <[1, 0] + <[1, x]>, [1, x] + <[1, x]>> + [0, 1]]) + """ + return self.base.identity_hom().quotient_codomain(self.killed_module) + + +_subs0 = lambda x: x[0] +_subs1 = lambda x: x[1:] + + +class ModuleOrder(ProductOrder): + """A product monomial order with a zeroth term as module index.""" + + def __init__(self, o1, o2, TOP): + if TOP: + ProductOrder.__init__(self, (o2, _subs1), (o1, _subs0)) + else: + ProductOrder.__init__(self, (o1, _subs0), (o2, _subs1)) + + +class SubModulePolyRing(SubModule): + """ + Submodule of a free module over a generalized polynomial ring. + + Do not instantiate this, use the constructor method of FreeModule instead: + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x, y).free_module(2) + >>> F.submodule([x, y], [1, 0]) + <[x, y], [1, 0]> + + Attributes: + + - order - monomial order used + """ + + #self._gb - cached groebner basis + #self._gbe - cached groebner basis relations + + def __init__(self, gens, container, order="lex", TOP=True): + SubModule.__init__(self, gens, container) + if not isinstance(container, FreeModulePolyRing): + raise NotImplementedError('This implementation is for submodules of ' + + 'FreeModulePolyRing, got %s' % container) + self.order = ModuleOrder(monomial_key(order), self.ring.order, TOP) + self._gb = None + self._gbe = None + + def __eq__(self, other): + if isinstance(other, SubModulePolyRing) and self.order != other.order: + return False + return SubModule.__eq__(self, other) + + def _groebner(self, extended=False): + """Returns a standard basis in sdm form.""" + from sympy.polys.distributedmodules import sdm_groebner, sdm_nf_mora + if self._gbe is None and extended: + gb, gbe = sdm_groebner( + [self.ring._vector_to_sdm(x, self.order) for x in self.gens], + sdm_nf_mora, self.order, self.ring.dom, extended=True) + self._gb, self._gbe = tuple(gb), tuple(gbe) + if self._gb is None: + self._gb = tuple(sdm_groebner( + [self.ring._vector_to_sdm(x, self.order) for x in self.gens], + sdm_nf_mora, self.order, self.ring.dom)) + if extended: + return self._gb, self._gbe + else: + return self._gb + + def _groebner_vec(self, extended=False): + """Returns a standard basis in element form.""" + if not extended: + return [FreeModuleElement(self, + tuple(self.ring._sdm_to_vector(x, self.rank))) + for x in self._groebner()] + gb, gbe = self._groebner(extended=True) + return ([self.convert(self.ring._sdm_to_vector(x, self.rank)) + for x in gb], + [self.ring._sdm_to_vector(x, len(self.gens)) for x in gbe]) + + def _contains(self, x): + from sympy.polys.distributedmodules import sdm_zero, sdm_nf_mora + return sdm_nf_mora(self.ring._vector_to_sdm(x, self.order), + self._groebner(), self.order, self.ring.dom) == \ + sdm_zero() + + def _syzygies(self): + """Compute syzygies. See [SCA, algorithm 2.5.4].""" + # NOTE if self.gens is a standard basis, this can be done more + # efficiently using Schreyer's theorem + + # First bullet point + k = len(self.gens) + r = self.rank + zero = self.ring.convert(0) + one = self.ring.convert(1) + Rkr = self.ring.free_module(r + k) + newgens = [] + for j, f in enumerate(self.gens): + m = [0]*(r + k) + for i, v in enumerate(f): + m[i] = v + for i in range(k): + m[r + i] = one if j == i else zero + m = FreeModuleElement(Rkr, tuple(m)) + newgens.append(m) + # Note: we need *descending* order on module index, and TOP=False to + # get an elimination order + F = Rkr.submodule(*newgens, order='ilex', TOP=False) + + # Second bullet point: standard basis of F + G = F._groebner_vec() + + # Third bullet point: G0 = G intersect the new k components + G0 = [x[r:] for x in G if all(y == zero for y in x[:r])] + + # Fourth and fifth bullet points: we are done + return G0 + + def _in_terms_of_generators(self, e): + """Expression in terms of generators. See [SCA, 2.8.1].""" + # NOTE: if gens is a standard basis, this can be done more efficiently + M = self.ring.free_module(self.rank).submodule(*((e,) + self.gens)) + S = M.syzygy_module( + order="ilex", TOP=False) # We want decreasing order! + G = S._groebner_vec() + # This list cannot not be empty since e is an element + e = [x for x in G if self.ring.is_unit(x[0])][0] + return [-x/e[0] for x in e[1:]] + + def reduce_element(self, x, NF=None): + """ + Reduce the element ``x`` of our container modulo ``self``. + + This applies the normal form ``NF`` to ``x``. If ``NF`` is passed + as none, the default Mora normal form is used (which is not unique!). + """ + from sympy.polys.distributedmodules import sdm_nf_mora + if NF is None: + NF = sdm_nf_mora + return self.container.convert(self.ring._sdm_to_vector(NF( + self.ring._vector_to_sdm(x, self.order), self._groebner(), + self.order, self.ring.dom), + self.rank)) + + def _intersect(self, other, relations=False): + # See: [SCA, section 2.8.2] + fi = self.gens + hi = other.gens + r = self.rank + ci = [[0]*(2*r) for _ in range(r)] + for k in range(r): + ci[k][k] = 1 + ci[k][r + k] = 1 + di = [list(f) + [0]*r for f in fi] + ei = [[0]*r + list(h) for h in hi] + syz = self.ring.free_module(2*r).submodule(*(ci + di + ei))._syzygies() + nonzero = [x for x in syz if any(y != self.ring.zero for y in x[:r])] + res = self.container.submodule(*([-y for y in x[:r]] for x in nonzero)) + reln1 = [x[r:r + len(fi)] for x in nonzero] + reln2 = [x[r + len(fi):] for x in nonzero] + if relations: + return res, reln1, reln2 + return res + + def _module_quotient(self, other, relations=False): + # See: [SCA, section 2.8.4] + if relations and len(other.gens) != 1: + raise NotImplementedError + if len(other.gens) == 0: + return self.ring.ideal(1) + elif len(other.gens) == 1: + # We do some trickery. Let f be the (vector!) generating ``other`` + # and f1, .., fn be the (vectors) generating self. + # Consider the submodule of R^{r+1} generated by (f, 1) and + # {(fi, 0) | i}. Then the intersection with the last module + # component yields the quotient. + g1 = list(other.gens[0]) + [1] + gi = [list(x) + [0] for x in self.gens] + # NOTE: We *need* to use an elimination order + M = self.ring.free_module(self.rank + 1).submodule(*([g1] + gi), + order='ilex', TOP=False) + if not relations: + return self.ring.ideal(*[x[-1] for x in M._groebner_vec() if + all(y == self.ring.zero for y in x[:-1])]) + else: + G, R = M._groebner_vec(extended=True) + indices = [i for i, x in enumerate(G) if + all(y == self.ring.zero for y in x[:-1])] + return (self.ring.ideal(*[G[i][-1] for i in indices]), + [[-x for x in R[i][1:]] for i in indices]) + # For more generators, we use I : = intersection of + # {I : | i} + # TODO this can be done more efficiently + return reduce(lambda x, y: x.intersect(y), + (self._module_quotient(self.container.submodule(x)) for x in other.gens)) + + +class SubModuleQuotientRing(SubModule): + """ + Class for submodules of free modules over quotient rings. + + Do not instantiate this. Instead use the submodule methods. + + >>> from sympy.abc import x, y + >>> from sympy import QQ + >>> M = (QQ.old_poly_ring(x, y)/[x**2 - y**2]).free_module(2).submodule([x, x + y]) + >>> M + <[x + , x + y + ]> + >>> M.contains([y**2, x**2 + x*y]) + True + >>> M.contains([x, y]) + False + + Attributes: + + - quot - the subquotient of `R^n/IR^n` generated by lifts of our generators + """ + + def __init__(self, gens, container): + SubModule.__init__(self, gens, container) + self.quot = self.container.quot.submodule( + *[self.container.lift(x) for x in self.gens]) + + def _contains(self, elem): + return self.quot._contains(self.container.lift(elem)) + + def _syzygies(self): + return [tuple(self.ring.convert(y, self.quot.ring) for y in x) + for x in self.quot._syzygies()] + + def _in_terms_of_generators(self, elem): + return [self.ring.convert(x, self.quot.ring) for x in + self.quot._in_terms_of_generators(self.container.lift(elem))] + +########################################################################## +## Quotient Modules ###################################################### +########################################################################## + + +class QuotientModuleElement(ModuleElement): + """Element of a quotient module.""" + + def eq(self, d1, d2): + """Equality comparison.""" + return self.module.killed_module.contains(d1 - d2) + + def __repr__(self): + return repr(self.data) + " + " + repr(self.module.killed_module) + + +class QuotientModule(Module): + """ + Class for quotient modules. + + Do not instantiate this directly. For subquotients, see the + SubQuotientModule class. + + Attributes: + + - base - the base module we are a quotient of + - killed_module - the submodule used to form the quotient + - rank of the base + """ + + dtype = QuotientModuleElement + + def __init__(self, ring, base, submodule): + Module.__init__(self, ring) + if not base.is_submodule(submodule): + raise ValueError('%s is not a submodule of %s' % (submodule, base)) + self.base = base + self.killed_module = submodule + self.rank = base.rank + + def __repr__(self): + return repr(self.base) + "/" + repr(self.killed_module) + + def is_zero(self): + """ + Return True if ``self`` is a zero module. + + This happens if and only if the base module is the same as the + submodule being killed. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) + >>> (F/[(1, 0)]).is_zero() + False + >>> (F/[(1, 0), (0, 1)]).is_zero() + True + """ + return self.base == self.killed_module + + def is_submodule(self, other): + """ + Return True if ``other`` is a submodule of ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> Q = QQ.old_poly_ring(x).free_module(2) / [(x, x)] + >>> S = Q.submodule([1, 0]) + >>> Q.is_submodule(S) + True + >>> S.is_submodule(Q) + False + """ + if isinstance(other, QuotientModule): + return self.killed_module == other.killed_module and \ + self.base.is_submodule(other.base) + if isinstance(other, SubQuotientModule): + return other.container == self + return False + + def submodule(self, *gens, **opts): + """ + Generate a submodule. + + This is the same as taking a quotient of a submodule of the base + module. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> Q = QQ.old_poly_ring(x).free_module(2) / [(x, x)] + >>> Q.submodule([x, 0]) + <[x, 0] + <[x, x]>> + """ + return SubQuotientModule(gens, self, **opts) + + def convert(self, elem, M=None): + """ + Convert ``elem`` into the internal representation. + + This method is called implicitly whenever computations involve elements + not in the internal representation. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> F = QQ.old_poly_ring(x).free_module(2) / [(1, 2), (1, x)] + >>> F.convert([1, 0]) + [1, 0] + <[1, 2], [1, x]> + """ + if isinstance(elem, QuotientModuleElement): + if elem.module is self: + return elem + if self.killed_module.is_submodule(elem.module.killed_module): + return QuotientModuleElement(self, self.base.convert(elem.data)) + raise CoercionFailed + return QuotientModuleElement(self, self.base.convert(elem)) + + def identity_hom(self): + """ + Return the identity homomorphism on ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x).free_module(2) / [(1, 2), (1, x)] + >>> M.identity_hom() + Matrix([ + [1, 0], : QQ[x]**2/<[1, 2], [1, x]> -> QQ[x]**2/<[1, 2], [1, x]> + [0, 1]]) + """ + return self.base.identity_hom().quotient_codomain( + self.killed_module).quotient_domain(self.killed_module) + + def quotient_hom(self): + """ + Return the quotient homomorphism to ``self``. + + That is, return a homomorphism representing the natural map from + ``self.base`` to ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> M = QQ.old_poly_ring(x).free_module(2) / [(1, 2), (1, x)] + >>> M.quotient_hom() + Matrix([ + [1, 0], : QQ[x]**2 -> QQ[x]**2/<[1, 2], [1, x]> + [0, 1]]) + """ + return self.base.identity_hom().quotient_codomain( + self.killed_module) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_extensions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_extensions.py new file mode 100644 index 0000000000000000000000000000000000000000..4becf4fd800a7a34c16989adaaf97e312c18f01c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_extensions.py @@ -0,0 +1,196 @@ +from sympy.core.symbol import symbols +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.polys import QQ, ZZ +from sympy.polys.polytools import Poly +from sympy.polys.polyerrors import NotInvertible +from sympy.polys.agca.extensions import FiniteExtension +from sympy.polys.domainmatrix import DomainMatrix + +from sympy.testing.pytest import raises + +from sympy.abc import x, y, t + + +def test_FiniteExtension(): + # Gaussian integers + A = FiniteExtension(Poly(x**2 + 1, x)) + assert A.rank == 2 + assert str(A) == 'ZZ[x]/(x**2 + 1)' + i = A.generator + assert i.parent() is A + + assert i*i == A(-1) + raises(TypeError, lambda: i*()) + + assert A.basis == (A.one, i) + assert A(1) == A.one + assert i**2 == A(-1) + assert i**2 != -1 # no coercion + assert (2 + i)*(1 - i) == 3 - i + assert (1 + i)**8 == A(16) + assert A(1).inverse() == A(1) + raises(NotImplementedError, lambda: A(2).inverse()) + + # Finite field of order 27 + F = FiniteExtension(Poly(x**3 - x + 1, x, modulus=3)) + assert F.rank == 3 + a = F.generator # also generates the cyclic group F - {0} + assert F.basis == (F(1), a, a**2) + assert a**27 == a + assert a**26 == F(1) + assert a**13 == F(-1) + assert a**9 == a + 1 + assert a**3 == a - 1 + assert a**6 == a**2 + a + 1 + assert F(x**2 + x).inverse() == 1 - a + assert F(x + 2)**(-1) == F(x + 2).inverse() + assert a**19 * a**(-19) == F(1) + assert (a - 1) / (2*a**2 - 1) == a**2 + 1 + assert (a - 1) // (2*a**2 - 1) == a**2 + 1 + assert 2/(a**2 + 1) == a**2 - a + 1 + assert (a**2 + 1)/2 == -a**2 - 1 + raises(NotInvertible, lambda: F(0).inverse()) + + # Function field of an elliptic curve + K = FiniteExtension(Poly(t**2 - x**3 - x + 1, t, field=True)) + assert K.rank == 2 + assert str(K) == 'ZZ(x)[t]/(t**2 - x**3 - x + 1)' + y = K.generator + c = 1/(x**3 - x**2 + x - 1) + assert ((y + x)*(y - x)).inverse() == K(c) + assert (y + x)*(y - x)*c == K(1) # explicit inverse of y + x + + +def test_FiniteExtension_eq_hash(): + # Test eq and hash + p1 = Poly(x**2 - 2, x, domain=ZZ) + p2 = Poly(x**2 - 2, x, domain=QQ) + K1 = FiniteExtension(p1) + K2 = FiniteExtension(p2) + assert K1 == FiniteExtension(Poly(x**2 - 2)) + assert K2 != FiniteExtension(Poly(x**2 - 2)) + assert len({K1, K2, FiniteExtension(p1)}) == 2 + + +def test_FiniteExtension_mod(): + # Test mod + K = FiniteExtension(Poly(x**3 + 1, x, domain=QQ)) + xf = K(x) + assert (xf**2 - 1) % 1 == K.zero + assert 1 % (xf**2 - 1) == K.zero + assert (xf**2 - 1) / (xf - 1) == xf + 1 + assert (xf**2 - 1) // (xf - 1) == xf + 1 + assert (xf**2 - 1) % (xf - 1) == K.zero + raises(ZeroDivisionError, lambda: (xf**2 - 1) % 0) + raises(TypeError, lambda: xf % []) + raises(TypeError, lambda: [] % xf) + + # Test mod over ring + K = FiniteExtension(Poly(x**3 + 1, x, domain=ZZ)) + xf = K(x) + assert (xf**2 - 1) % 1 == K.zero + raises(NotImplementedError, lambda: (xf**2 - 1) % (xf - 1)) + + +def test_FiniteExtension_from_sympy(): + # Test to_sympy/from_sympy + K = FiniteExtension(Poly(x**3 + 1, x, domain=ZZ)) + xf = K(x) + assert K.from_sympy(x) == xf + assert K.to_sympy(xf) == x + + +def test_FiniteExtension_set_domain(): + KZ = FiniteExtension(Poly(x**2 + 1, x, domain='ZZ')) + KQ = FiniteExtension(Poly(x**2 + 1, x, domain='QQ')) + assert KZ.set_domain(QQ) == KQ + + +def test_FiniteExtension_exquo(): + # Test exquo + K = FiniteExtension(Poly(x**4 + 1)) + xf = K(x) + assert K.exquo(xf**2 - 1, xf - 1) == xf + 1 + + +def test_FiniteExtension_convert(): + # Test from_MonogenicFiniteExtension + K1 = FiniteExtension(Poly(x**2 + 1)) + K2 = QQ[x] + x1, x2 = K1(x), K2(x) + assert K1.convert(x2) == x1 + assert K2.convert(x1) == x2 + + K = FiniteExtension(Poly(x**2 - 1, domain=QQ)) + assert K.convert_from(QQ(1, 2), QQ) == K.one/2 + + +def test_FiniteExtension_division_ring(): + # Test division in FiniteExtension over a ring + KQ = FiniteExtension(Poly(x**2 - 1, x, domain=QQ)) + KZ = FiniteExtension(Poly(x**2 - 1, x, domain=ZZ)) + KQt = FiniteExtension(Poly(x**2 - 1, x, domain=QQ[t])) + KQtf = FiniteExtension(Poly(x**2 - 1, x, domain=QQ.frac_field(t))) + assert KQ.is_Field is True + assert KZ.is_Field is False + assert KQt.is_Field is False + assert KQtf.is_Field is True + for K in KQ, KZ, KQt, KQtf: + xK = K.convert(x) + assert xK / K.one == xK + assert xK // K.one == xK + assert xK % K.one == K.zero + raises(ZeroDivisionError, lambda: xK / K.zero) + raises(ZeroDivisionError, lambda: xK // K.zero) + raises(ZeroDivisionError, lambda: xK % K.zero) + if K.is_Field: + assert xK / xK == K.one + assert xK // xK == K.one + assert xK % xK == K.zero + else: + raises(NotImplementedError, lambda: xK / xK) + raises(NotImplementedError, lambda: xK // xK) + raises(NotImplementedError, lambda: xK % xK) + + +def test_FiniteExtension_Poly(): + K = FiniteExtension(Poly(x**2 - 2)) + p = Poly(x, y, domain=K) + assert p.domain == K + assert p.as_expr() == x + assert (p**2).as_expr() == 2 + + K = FiniteExtension(Poly(x**2 - 2, x, domain=QQ)) + K2 = FiniteExtension(Poly(t**2 - 2, t, domain=K)) + assert str(K2) == 'QQ[x]/(x**2 - 2)[t]/(t**2 - 2)' + + eK = K2.convert(x + t) + assert K2.to_sympy(eK) == x + t + assert K2.to_sympy(eK ** 2) == 4 + 2*x*t + p = Poly(x + t, y, domain=K2) + assert p**2 == Poly(4 + 2*x*t, y, domain=K2) + + +def test_FiniteExtension_sincos_jacobian(): + # Use FiniteExtensino to compute the Jacobian of a matrix involving sin + # and cos of different symbols. + r, p, t = symbols('rho, phi, theta') + elements = [ + [sin(p)*cos(t), r*cos(p)*cos(t), -r*sin(p)*sin(t)], + [sin(p)*sin(t), r*cos(p)*sin(t), r*sin(p)*cos(t)], + [ cos(p), -r*sin(p), 0], + ] + + def make_extension(K): + K = FiniteExtension(Poly(sin(p)**2+cos(p)**2-1, sin(p), domain=K[cos(p)])) + K = FiniteExtension(Poly(sin(t)**2+cos(t)**2-1, sin(t), domain=K[cos(t)])) + return K + + Ksc1 = make_extension(ZZ[r]) + Ksc2 = make_extension(ZZ)[r] + + for K in [Ksc1, Ksc2]: + elements_K = [[K.convert(e) for e in row] for row in elements] + J = DomainMatrix(elements_K, (3, 3), K) + det = J.charpoly()[-1] * (-K.one)**3 + assert det == K.convert(r**2*sin(p)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_homomorphisms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_homomorphisms.py new file mode 100644 index 0000000000000000000000000000000000000000..2e63838e09ed9b9436a58a7d8041175e731bc4ef --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_homomorphisms.py @@ -0,0 +1,113 @@ +"""Tests for homomorphisms.""" + +from sympy.core.singleton import S +from sympy.polys.domains.rationalfield import QQ +from sympy.abc import x, y +from sympy.polys.agca import homomorphism +from sympy.testing.pytest import raises + + +def test_printing(): + R = QQ.old_poly_ring(x) + + assert str(homomorphism(R.free_module(1), R.free_module(1), [0])) == \ + 'Matrix([[0]]) : QQ[x]**1 -> QQ[x]**1' + assert str(homomorphism(R.free_module(2), R.free_module(2), [0, 0])) == \ + 'Matrix([ \n[0, 0], : QQ[x]**2 -> QQ[x]**2\n[0, 0]]) ' + assert str(homomorphism(R.free_module(1), R.free_module(1) / [[x]], [0])) == \ + 'Matrix([[0]]) : QQ[x]**1 -> QQ[x]**1/<[x]>' + assert str(R.free_module(0).identity_hom()) == 'Matrix(0, 0, []) : QQ[x]**0 -> QQ[x]**0' + +def test_operations(): + F = QQ.old_poly_ring(x).free_module(2) + G = QQ.old_poly_ring(x).free_module(3) + f = F.identity_hom() + g = homomorphism(F, F, [0, [1, x]]) + h = homomorphism(F, F, [[1, 0], 0]) + i = homomorphism(F, G, [[1, 0, 0], [0, 1, 0]]) + + assert f == f + assert f != g + assert f != i + assert (f != F.identity_hom()) is False + assert 2*f == f*2 == homomorphism(F, F, [[2, 0], [0, 2]]) + assert f/2 == homomorphism(F, F, [[S.Half, 0], [0, S.Half]]) + assert f + g == homomorphism(F, F, [[1, 0], [1, x + 1]]) + assert f - g == homomorphism(F, F, [[1, 0], [-1, 1 - x]]) + assert f*g == g == g*f + assert h*g == homomorphism(F, F, [0, [1, 0]]) + assert g*h == homomorphism(F, F, [0, 0]) + assert i*f == i + assert f([1, 2]) == [1, 2] + assert g([1, 2]) == [2, 2*x] + + assert i.restrict_domain(F.submodule([x, x]))([x, x]) == i([x, x]) + h1 = h.quotient_domain(F.submodule([0, 1])) + assert h1([1, 0]) == h([1, 0]) + assert h1.restrict_domain(h1.domain.submodule([x, 0]))([x, 0]) == h([x, 0]) + + raises(TypeError, lambda: f/g) + raises(TypeError, lambda: f + 1) + raises(TypeError, lambda: f + i) + raises(TypeError, lambda: f - 1) + raises(TypeError, lambda: f*i) + + +def test_creation(): + F = QQ.old_poly_ring(x).free_module(3) + G = QQ.old_poly_ring(x).free_module(2) + SM = F.submodule([1, 1, 1]) + Q = F / SM + SQ = Q.submodule([1, 0, 0]) + + matrix = [[1, 0], [0, 1], [-1, -1]] + h = homomorphism(F, G, matrix) + h2 = homomorphism(Q, G, matrix) + assert h.quotient_domain(SM) == h2 + raises(ValueError, lambda: h.quotient_domain(F.submodule([1, 0, 0]))) + assert h2.restrict_domain(SQ) == homomorphism(SQ, G, matrix) + raises(ValueError, lambda: h.restrict_domain(G)) + raises(ValueError, lambda: h.restrict_codomain(G.submodule([1, 0]))) + raises(ValueError, lambda: h.quotient_codomain(F)) + + im = [[1, 0, 0], [0, 1, 0], [0, 0, 1]] + for M in [F, SM, Q, SQ]: + assert M.identity_hom() == homomorphism(M, M, im) + assert SM.inclusion_hom() == homomorphism(SM, F, im) + assert SQ.inclusion_hom() == homomorphism(SQ, Q, im) + assert Q.quotient_hom() == homomorphism(F, Q, im) + assert SQ.quotient_hom() == homomorphism(SQ.base, SQ, im) + + class conv: + def convert(x, y=None): + return x + + class dummy: + container = conv() + + def submodule(*args): + return None + raises(TypeError, lambda: homomorphism(dummy(), G, matrix)) + raises(TypeError, lambda: homomorphism(F, dummy(), matrix)) + raises( + ValueError, lambda: homomorphism(QQ.old_poly_ring(x, y).free_module(3), G, matrix)) + raises(ValueError, lambda: homomorphism(F, G, [0, 0])) + + +def test_properties(): + R = QQ.old_poly_ring(x, y) + F = R.free_module(2) + h = homomorphism(F, F, [[x, 0], [y, 0]]) + assert h.kernel() == F.submodule([-y, x]) + assert h.image() == F.submodule([x, 0], [y, 0]) + assert not h.is_injective() + assert not h.is_surjective() + assert h.restrict_codomain(h.image()).is_surjective() + assert h.restrict_domain(F.submodule([1, 0])).is_injective() + assert h.quotient_domain( + h.kernel()).restrict_codomain(h.image()).is_isomorphism() + + R2 = QQ.old_poly_ring(x, y, order=(("lex", x), ("ilex", y))) / [x**2 + 1] + F = R2.free_module(2) + h = homomorphism(F, F, [[x, 0], [y, y + 1]]) + assert h.is_isomorphism() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_ideals.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_ideals.py new file mode 100644 index 0000000000000000000000000000000000000000..b7fff0674b54a22e2a5acba5110d62d96a877074 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_ideals.py @@ -0,0 +1,131 @@ +"""Test ideals.py code.""" + +from sympy.polys import QQ, ilex +from sympy.abc import x, y, z +from sympy.testing.pytest import raises + + +def test_ideal_operations(): + R = QQ.old_poly_ring(x, y) + I = R.ideal(x) + J = R.ideal(y) + S = R.ideal(x*y) + T = R.ideal(x, y) + + assert not (I == J) + assert I == I + + assert I.union(J) == T + assert I + J == T + assert I + T == T + + assert not I.subset(T) + assert T.subset(I) + + assert I.product(J) == S + assert I*J == S + assert x*J == S + assert I*y == S + assert R.convert(x)*J == S + assert I*R.convert(y) == S + + assert not I.is_zero() + assert not J.is_whole_ring() + + assert R.ideal(x**2 + 1, x).is_whole_ring() + assert R.ideal() == R.ideal(0) + assert R.ideal().is_zero() + + assert T.contains(x*y) + assert T.subset([x, y]) + + assert T.in_terms_of_generators(x) == [R(1), R(0)] + + assert T**0 == R.ideal(1) + assert T**1 == T + assert T**2 == R.ideal(x**2, y**2, x*y) + assert I**5 == R.ideal(x**5) + + +def test_exceptions(): + I = QQ.old_poly_ring(x).ideal(x) + J = QQ.old_poly_ring(y).ideal(1) + raises(ValueError, lambda: I.union(x)) + raises(ValueError, lambda: I + J) + raises(ValueError, lambda: I * J) + raises(ValueError, lambda: I.union(J)) + assert (I == J) is False + assert I != J + + +def test_nontriv_global(): + R = QQ.old_poly_ring(x, y, z) + + def contains(I, f): + return R.ideal(*I).contains(f) + + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**3) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4 + y**3 + 2*z*y*x) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y*z) + assert contains([x, 1 + x + y, 5 - 7*y], 1) + assert contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**3) + assert not contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**2 + y**2) + + # compare local order + assert not contains([x*(1 + x + y), y*(1 + z)], x) + assert not contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_nontriv_local(): + R = QQ.old_poly_ring(x, y, z, order=ilex) + + def contains(I, f): + return R.ideal(*I).contains(f) + + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x*(1 + x + y), y*(1 + z)], x) + assert contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_intersection(): + R = QQ.old_poly_ring(x, y, z) + # SCA, example 1.8.11 + assert R.ideal(x, y).intersect(R.ideal(y**2, z)) == R.ideal(y**2, y*z, x*z) + + assert R.ideal(x, y).intersect(R.ideal()).is_zero() + + R = QQ.old_poly_ring(x, y, z, order="ilex") + assert R.ideal(x, y).intersect(R.ideal(y**2 + y**2*z, z + z*x**3*y)) == \ + R.ideal(y**2, y*z, x*z) + + +def test_quotient(): + # SCA, example 1.8.13 + R = QQ.old_poly_ring(x, y, z) + assert R.ideal(x, y).quotient(R.ideal(y**2, z)) == R.ideal(x, y) + + +def test_reduction(): + from sympy.polys.distributedmodules import sdm_nf_buchberger_reduced + R = QQ.old_poly_ring(x, y) + I = R.ideal(x**5, y) + e = R.convert(x**3 + y**2) + assert I.reduce_element(e) == e + assert I.reduce_element(e, NF=sdm_nf_buchberger_reduced) == R.convert(x**3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_modules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_modules.py new file mode 100644 index 0000000000000000000000000000000000000000..29c2d4ce45f452f6f61420654be64a67d13b396b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/agca/tests/test_modules.py @@ -0,0 +1,408 @@ +"""Test modules.py code.""" + +from sympy.polys.agca.modules import FreeModule, ModuleOrder, FreeModulePolyRing +from sympy.polys import CoercionFailed, QQ, lex, grlex, ilex, ZZ +from sympy.abc import x, y, z +from sympy.testing.pytest import raises +from sympy.core.numbers import Rational + + +def test_FreeModuleElement(): + M = QQ.old_poly_ring(x).free_module(3) + e = M.convert([1, x, x**2]) + f = [QQ.old_poly_ring(x).convert(1), QQ.old_poly_ring(x).convert(x), QQ.old_poly_ring(x).convert(x**2)] + assert list(e) == f + assert f[0] == e[0] + assert f[1] == e[1] + assert f[2] == e[2] + raises(IndexError, lambda: e[3]) + + g = M.convert([x, 0, 0]) + assert e + g == M.convert([x + 1, x, x**2]) + assert f + g == M.convert([x + 1, x, x**2]) + assert -e == M.convert([-1, -x, -x**2]) + assert e - g == M.convert([1 - x, x, x**2]) + assert e != g + + assert M.convert([x, x, x]) / QQ.old_poly_ring(x).convert(x) == [1, 1, 1] + R = QQ.old_poly_ring(x, order="ilex") + assert R.free_module(1).convert([x]) / R.convert(x) == [1] + + +def test_FreeModule(): + M1 = FreeModule(QQ.old_poly_ring(x), 2) + assert M1 == FreeModule(QQ.old_poly_ring(x), 2) + assert M1 != FreeModule(QQ.old_poly_ring(y), 2) + assert M1 != FreeModule(QQ.old_poly_ring(x), 3) + M2 = FreeModule(QQ.old_poly_ring(x, order="ilex"), 2) + + assert [x, 1] in M1 + assert [x] not in M1 + assert [2, y] not in M1 + assert [1/(x + 1), 2] not in M1 + + e = M1.convert([x, x**2 + 1]) + X = QQ.old_poly_ring(x).convert(x) + assert e == [X, X**2 + 1] + assert e == [x, x**2 + 1] + assert 2*e == [2*x, 2*x**2 + 2] + assert e*2 == [2*x, 2*x**2 + 2] + assert e/2 == [x/2, (x**2 + 1)/2] + assert x*e == [x**2, x**3 + x] + assert e*x == [x**2, x**3 + x] + assert X*e == [x**2, x**3 + x] + assert e*X == [x**2, x**3 + x] + + assert [x, 1] in M2 + assert [x] not in M2 + assert [2, y] not in M2 + assert [1/(x + 1), 2] in M2 + + e = M2.convert([x, x**2 + 1]) + X = QQ.old_poly_ring(x, order="ilex").convert(x) + assert e == [X, X**2 + 1] + assert e == [x, x**2 + 1] + assert 2*e == [2*x, 2*x**2 + 2] + assert e*2 == [2*x, 2*x**2 + 2] + assert e/2 == [x/2, (x**2 + 1)/2] + assert x*e == [x**2, x**3 + x] + assert e*x == [x**2, x**3 + x] + assert e/(1 + x) == [x/(1 + x), (x**2 + 1)/(1 + x)] + assert X*e == [x**2, x**3 + x] + assert e*X == [x**2, x**3 + x] + + M3 = FreeModule(QQ.old_poly_ring(x, y), 2) + assert M3.convert(e) == M3.convert([x, x**2 + 1]) + + assert not M3.is_submodule(0) + assert not M3.is_zero() + + raises(NotImplementedError, lambda: ZZ.old_poly_ring(x).free_module(2)) + raises(NotImplementedError, lambda: FreeModulePolyRing(ZZ, 2)) + raises(CoercionFailed, lambda: M1.convert(QQ.old_poly_ring(x).free_module(3) + .convert([1, 2, 3]))) + raises(CoercionFailed, lambda: M3.convert(1)) + + +def test_ModuleOrder(): + o1 = ModuleOrder(lex, grlex, False) + o2 = ModuleOrder(ilex, lex, False) + + assert o1 == ModuleOrder(lex, grlex, False) + assert (o1 != ModuleOrder(lex, grlex, False)) is False + assert o1 != o2 + + assert o1((1, 2, 3)) == (1, (5, (2, 3))) + assert o2((1, 2, 3)) == (-1, (2, 3)) + + +def test_SubModulePolyRing_global(): + R = QQ.old_poly_ring(x, y) + F = R.free_module(3) + Fd = F.submodule([1, 0, 0], [1, 2, 0], [1, 2, 3]) + M = F.submodule([x**2 + y**2, 1, 0], [x, y, 1]) + + assert F == Fd + assert Fd == F + assert F != M + assert M != F + assert Fd != M + assert M != Fd + assert Fd == F.submodule(*F.basis()) + + assert Fd.is_full_module() + assert not M.is_full_module() + assert not Fd.is_zero() + assert not M.is_zero() + assert Fd.submodule().is_zero() + + assert M.contains([x**2 + y**2 + x, 1 + y, 1]) + assert not M.contains([x**2 + y**2 + x, 1 + y, 2]) + assert M.contains([y**2, 1 - x*y, -x]) + + assert not F.submodule([1 + x, 0, 0]) == F.submodule([1, 0, 0]) + assert F.submodule([1, 0, 0], [0, 1, 0]).union(F.submodule([0, 0, 1])) == F + assert not M.is_submodule(0) + + m = F.convert([x**2 + y**2, 1, 0]) + n = M.convert(m) + assert m.module is F + assert n.module is M + + raises(ValueError, lambda: M.submodule([1, 0, 0])) + raises(TypeError, lambda: M.union(1)) + raises(ValueError, lambda: M.union(R.free_module(1).submodule([x]))) + + assert F.submodule([x, x, x]) != F.submodule([x, x, x], order="ilex") + + +def test_SubModulePolyRing_local(): + R = QQ.old_poly_ring(x, y, order=ilex) + F = R.free_module(3) + Fd = F.submodule([1 + x, 0, 0], [1 + y, 2 + 2*y, 0], [1, 2, 3]) + M = F.submodule([x**2 + y**2, 1, 0], [x, y, 1]) + + assert F == Fd + assert Fd == F + assert F != M + assert M != F + assert Fd != M + assert M != Fd + assert Fd == F.submodule(*F.basis()) + + assert Fd.is_full_module() + assert not M.is_full_module() + assert not Fd.is_zero() + assert not M.is_zero() + assert Fd.submodule().is_zero() + + assert M.contains([x**2 + y**2 + x, 1 + y, 1]) + assert not M.contains([x**2 + y**2 + x, 1 + y, 2]) + assert M.contains([y**2, 1 - x*y, -x]) + + assert F.submodule([1 + x, 0, 0]) == F.submodule([1, 0, 0]) + assert F.submodule( + [1, 0, 0], [0, 1, 0]).union(F.submodule([0, 0, 1 + x*y])) == F + + raises(ValueError, lambda: M.submodule([1, 0, 0])) + + +def test_SubModulePolyRing_nontriv_global(): + R = QQ.old_poly_ring(x, y, z) + F = R.free_module(1) + + def contains(I, f): + return F.submodule(*[[g] for g in I]).contains([f]) + + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**3) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4 + y**3 + 2*z*y*x) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y*z) + assert contains([x, 1 + x + y, 5 - 7*y], 1) + assert contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**3) + assert not contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**2 + y**2) + + # compare local order + assert not contains([x*(1 + x + y), y*(1 + z)], x) + assert not contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_SubModulePolyRing_nontriv_local(): + R = QQ.old_poly_ring(x, y, z, order=ilex) + F = R.free_module(1) + + def contains(I, f): + return F.submodule(*[[g] for g in I]).contains([f]) + + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x*(1 + x + y), y*(1 + z)], x) + assert contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_syzygy(): + R = QQ.old_poly_ring(x, y, z) + M = R.free_module(1).submodule([x*y], [y*z], [x*z]) + S = R.free_module(3).submodule([0, x, -y], [z, -x, 0]) + assert M.syzygy_module() == S + + M2 = M / ([x*y*z],) + S2 = R.free_module(3).submodule([z, 0, 0], [0, x, 0], [0, 0, y]) + assert M2.syzygy_module() == S2 + + F = R.free_module(3) + assert F.submodule(*F.basis()).syzygy_module() == F.submodule() + + R2 = QQ.old_poly_ring(x, y, z) / [x*y*z] + M3 = R2.free_module(1).submodule([x*y], [y*z], [x*z]) + S3 = R2.free_module(3).submodule([z, 0, 0], [0, x, 0], [0, 0, y]) + assert M3.syzygy_module() == S3 + + +def test_in_terms_of_generators(): + R = QQ.old_poly_ring(x, order="ilex") + M = R.free_module(2).submodule([2*x, 0], [1, 2]) + assert M.in_terms_of_generators( + [x, x]) == [R.convert(Rational(1, 4)), R.convert(x/2)] + raises(ValueError, lambda: M.in_terms_of_generators([1, 0])) + + M = R.free_module(2) / ([x, 0], [1, 1]) + SM = M.submodule([1, x]) + assert SM.in_terms_of_generators([2, 0]) == [R.convert(-2/(x - 1))] + + R = QQ.old_poly_ring(x, y) / [x**2 - y**2] + M = R.free_module(2) + SM = M.submodule([x, 0], [0, y]) + assert SM.in_terms_of_generators( + [x**2, x**2]) == [R.convert(x), R.convert(y)] + + +def test_QuotientModuleElement(): + R = QQ.old_poly_ring(x) + F = R.free_module(3) + N = F.submodule([1, x, x**2]) + M = F/N + e = M.convert([x**2, 2, 0]) + + assert M.convert([x + 1, x**2 + x, x**3 + x**2]) == 0 + assert e == [x**2, 2, 0] + N == F.convert([x**2, 2, 0]) + N == \ + M.convert(F.convert([x**2, 2, 0])) + + assert M.convert([x**2 + 1, 2*x + 2, x**2]) == e + [0, x, 0] == \ + e + M.convert([0, x, 0]) == e + F.convert([0, x, 0]) + assert M.convert([x**2 + 1, 2, x**2]) == e - [0, x, 0] == \ + e - M.convert([0, x, 0]) == e - F.convert([0, x, 0]) + assert M.convert([0, 2, 0]) == M.convert([x**2, 4, 0]) - e == \ + [x**2, 4, 0] - e == F.convert([x**2, 4, 0]) - e + assert M.convert([x**3 + x**2, 2*x + 2, 0]) == (1 + x)*e == \ + R.convert(1 + x)*e == e*(1 + x) == e*R.convert(1 + x) + assert -e == [-x**2, -2, 0] + + f = [x, x, 0] + N + assert M.convert([1, 1, 0]) == f / x == f / R.convert(x) + + M2 = F/[(2, 2*x, 2*x**2), (0, 0, 1)] + G = R.free_module(2) + M3 = G/[[1, x]] + M4 = F.submodule([1, x, x**2], [1, 0, 0]) / N + raises(CoercionFailed, lambda: M.convert(G.convert([1, x]))) + raises(CoercionFailed, lambda: M.convert(M3.convert([1, x]))) + raises(CoercionFailed, lambda: M.convert(M2.convert([1, x, x]))) + assert M2.convert(M.convert([2, x, x**2])) == [2, x, 0] + assert M.convert(M4.convert([2, 0, 0])) == [2, 0, 0] + + +def test_QuotientModule(): + R = QQ.old_poly_ring(x) + F = R.free_module(3) + N = F.submodule([1, x, x**2]) + M = F/N + + assert M != F + assert M != N + assert M == F / [(1, x, x**2)] + assert not M.is_zero() + assert (F / F.basis()).is_zero() + + SQ = F.submodule([1, x, x**2], [2, 0, 0]) / N + assert SQ == M.submodule([2, x, x**2]) + assert SQ != M.submodule([2, 1, 0]) + assert SQ != M + assert M.is_submodule(SQ) + assert not SQ.is_full_module() + + raises(ValueError, lambda: N/F) + raises(ValueError, lambda: F.submodule([2, 0, 0]) / N) + raises(ValueError, lambda: R.free_module(2)/F) + raises(CoercionFailed, lambda: F.convert(M.convert([1, x, x**2]))) + + M1 = F / [[1, 1, 1]] + M2 = M1.submodule([1, 0, 0], [0, 1, 0]) + assert M1 == M2 + + +def test_ModulesQuotientRing(): + R = QQ.old_poly_ring(x, y, order=(("lex", x), ("ilex", y))) / [x**2 + 1] + M1 = R.free_module(2) + assert M1 == R.free_module(2) + assert M1 != QQ.old_poly_ring(x).free_module(2) + assert M1 != R.free_module(3) + + assert [x, 1] in M1 + assert [x] not in M1 + assert [1/(R.convert(x) + 1), 2] in M1 + assert [1, 2/(1 + y)] in M1 + assert [1, 2/y] not in M1 + + assert M1.convert([x**2, y]) == [-1, y] + + F = R.free_module(3) + Fd = F.submodule([x**2, 0, 0], [1, 2, 0], [1, 2, 3]) + M = F.submodule([x**2 + y**2, 1, 0], [x, y, 1]) + + assert F == Fd + assert Fd == F + assert F != M + assert M != F + assert Fd != M + assert M != Fd + assert Fd == F.submodule(*F.basis()) + + assert Fd.is_full_module() + assert not M.is_full_module() + assert not Fd.is_zero() + assert not M.is_zero() + assert Fd.submodule().is_zero() + + assert M.contains([x**2 + y**2 + x, -x**2 + y, 1]) + assert not M.contains([x**2 + y**2 + x, 1 + y, 2]) + assert M.contains([y**2, 1 - x*y, -x]) + + assert F.submodule([x, 0, 0]) == F.submodule([1, 0, 0]) + assert not F.submodule([y, 0, 0]) == F.submodule([1, 0, 0]) + assert F.submodule([1, 0, 0], [0, 1, 0]).union(F.submodule([0, 0, 1])) == F + assert not M.is_submodule(0) + + +def test_module_mul(): + R = QQ.old_poly_ring(x) + M = R.free_module(2) + S1 = M.submodule([x, 0], [0, x]) + S2 = M.submodule([x**2, 0], [0, x**2]) + I = R.ideal(x) + + assert I*M == M*I == S1 == x*M == M*x + assert I*S1 == S2 == x*S1 + + +def test_intersection(): + # SCA, example 2.8.5 + F = QQ.old_poly_ring(x, y).free_module(2) + M1 = F.submodule([x, y], [y, 1]) + M2 = F.submodule([0, y - 1], [x, 1], [y, x]) + I = F.submodule([x, y], [y**2 - y, y - 1], [x*y + y, x + 1]) + I1, rel1, rel2 = M1.intersect(M2, relations=True) + assert I1 == M2.intersect(M1) == I + for i, g in enumerate(I1.gens): + assert g == sum(c*x for c, x in zip(rel1[i], M1.gens)) \ + == sum(d*y for d, y in zip(rel2[i], M2.gens)) + + assert F.submodule([x, y]).intersect(F.submodule([y, x])).is_zero() + + +def test_quotient(): + # SCA, example 2.8.6 + R = QQ.old_poly_ring(x, y, z) + F = R.free_module(2) + assert F.submodule([x*y, x*z], [y*z, x*y]).module_quotient( + F.submodule([y, z], [z, y])) == QQ.old_poly_ring(x, y, z).ideal(x**2*y**2 - x*y*z**2) + assert F.submodule([x, y]).module_quotient(F.submodule()).is_whole_ring() + + M = F.submodule([x**2, x**2], [y**2, y**2]) + N = F.submodule([x + y, x + y]) + q, rel = M.module_quotient(N, relations=True) + assert q == R.ideal(y**2, x - y) + for i, g in enumerate(q.gens): + assert g*N.gens[0] == sum(c*x for c, x in zip(rel[i], M.gens)) + + +def test_groebner_extendend(): + M = QQ.old_poly_ring(x, y, z).free_module(3).submodule([x + 1, y, 1], [x*y, z, z**2]) + G, R = M._groebner_vec(extended=True) + for i, g in enumerate(G): + assert g == sum(c*gen for c, gen in zip(R[i], M.gens)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/appellseqs.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/appellseqs.py new file mode 100644 index 0000000000000000000000000000000000000000..ac10fe3d1f1e60ccdf46cdae4eb5b8a969500a3e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/appellseqs.py @@ -0,0 +1,269 @@ +r""" +Efficient functions for generating Appell sequences. + +An Appell sequence is a zero-indexed sequence of polynomials `p_i(x)` +satisfying `p_{i+1}'(x)=(i+1)p_i(x)` for all `i`. This definition leads +to the following iterative algorithm: + +.. math :: p_0(x) = c_0,\ p_i(x) = i \int_0^x p_{i-1}(t)\,dt + c_i + +The constant coefficients `c_i` are usually determined from the +just-evaluated integral and `i`. + +Appell sequences satisfy the following identity from umbral calculus: + +.. math :: p_n(x+y) = \sum_{k=0}^n \binom{n}{k} p_k(x) y^{n-k} + +References +========== + +.. [1] https://en.wikipedia.org/wiki/Appell_sequence +.. [2] Peter Luschny, "An introduction to the Bernoulli function", + https://arxiv.org/abs/2009.06743 +""" +from sympy.polys.densearith import dup_mul_ground, dup_sub_ground, dup_quo_ground +from sympy.polys.densetools import dup_eval, dup_integrate +from sympy.polys.domains import ZZ, QQ +from sympy.polys.polytools import named_poly +from sympy.utilities import public + +def dup_bernoulli(n, K): + """Low-level implementation of Bernoulli polynomials.""" + if n < 1: + return [K.one] + p = [K.one, K(-1,2)] + for i in range(2, n+1): + p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K) + if i % 2 == 0: + p = dup_sub_ground(p, dup_eval(p, K(1,2), K) * K(1<<(i-1), (1<>> from sympy import summation + >>> from sympy.abc import x + >>> from sympy.polys import bernoulli_poly + >>> bernoulli_poly(5, x) + x**5 - 5*x**4/2 + 5*x**3/3 - x/6 + + >>> def psum(p, a, b): + ... return (bernoulli_poly(p+1,b+1) - bernoulli_poly(p+1,a)) / (p+1) + >>> psum(4, -6, 27) + 3144337 + >>> summation(x**4, (x, -6, 27)) + 3144337 + + >>> psum(1, 1, x).factor() + x*(x + 1)/2 + >>> psum(2, 1, x).factor() + x*(x + 1)*(2*x + 1)/6 + >>> psum(3, 1, x).factor() + x**2*(x + 1)**2/4 + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + + See Also + ======== + + sympy.functions.combinatorial.numbers.bernoulli + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Bernoulli_polynomials + """ + return named_poly(n, dup_bernoulli, QQ, "Bernoulli polynomial", (x,), polys) + +def dup_bernoulli_c(n, K): + """Low-level implementation of central Bernoulli polynomials.""" + p = [K.one] + for i in range(1, n+1): + p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K) + if i % 2 == 0: + p = dup_sub_ground(p, dup_eval(p, K.one, K) * K((1<<(i-1))-1, (1<>> from sympy import bernoulli, euler, genocchi + >>> from sympy.abc import x + >>> from sympy.polys import andre_poly + >>> andre_poly(9, x) + x**9 - 36*x**7 + 630*x**5 - 5124*x**3 + 12465*x + + >>> [andre_poly(n, 0) for n in range(11)] + [1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521] + >>> [euler(n) for n in range(11)] + [1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521] + >>> [andre_poly(n-1, 1) * n / (4**n - 2**n) for n in range(1, 11)] + [1/2, 1/6, 0, -1/30, 0, 1/42, 0, -1/30, 0, 5/66] + >>> [bernoulli(n) for n in range(1, 11)] + [1/2, 1/6, 0, -1/30, 0, 1/42, 0, -1/30, 0, 5/66] + >>> [-andre_poly(n-1, -1) * n / (-2)**(n-1) for n in range(1, 11)] + [-1, -1, 0, 1, 0, -3, 0, 17, 0, -155] + >>> [genocchi(n) for n in range(1, 11)] + [-1, -1, 0, 1, 0, -3, 0, 17, 0, -155] + + >>> [abs(andre_poly(n, n%2)) for n in range(11)] + [1, 1, 1, 2, 5, 16, 61, 272, 1385, 7936, 50521] + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + + See Also + ======== + + sympy.functions.combinatorial.numbers.andre + + References + ========== + + .. [1] Peter Luschny, "An introduction to the Bernoulli function", + https://arxiv.org/abs/2009.06743 + """ + return named_poly(n, dup_andre, ZZ, "Andre polynomial", (x,), polys) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_galoispolys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_galoispolys.py new file mode 100644 index 0000000000000000000000000000000000000000..8b2a0329a0cf96be2e8359a3741d8e2de13fa37a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_galoispolys.py @@ -0,0 +1,66 @@ +"""Benchmarks for polynomials over Galois fields. """ + + +from sympy.polys.galoistools import gf_from_dict, gf_factor_sqf +from sympy.polys.domains import ZZ +from sympy.core.numbers import pi +from sympy.ntheory.generate import nextprime + + +def gathen_poly(n, p, K): + return gf_from_dict({n: K.one, 1: K.one, 0: K.one}, p, K) + + +def shoup_poly(n, p, K): + f = [K.one] * (n + 1) + for i in range(1, n + 1): + f[i] = (f[i - 1]**2 + K.one) % p + return f + + +def genprime(n, K): + return K(nextprime(int((2**n * pi).evalf()))) + +p_10 = genprime(10, ZZ) +f_10 = gathen_poly(10, p_10, ZZ) + +p_20 = genprime(20, ZZ) +f_20 = gathen_poly(20, p_20, ZZ) + + +def timeit_gathen_poly_f10_zassenhaus(): + gf_factor_sqf(f_10, p_10, ZZ, method='zassenhaus') + + +def timeit_gathen_poly_f10_shoup(): + gf_factor_sqf(f_10, p_10, ZZ, method='shoup') + + +def timeit_gathen_poly_f20_zassenhaus(): + gf_factor_sqf(f_20, p_20, ZZ, method='zassenhaus') + + +def timeit_gathen_poly_f20_shoup(): + gf_factor_sqf(f_20, p_20, ZZ, method='shoup') + +P_08 = genprime(8, ZZ) +F_10 = shoup_poly(10, P_08, ZZ) + +P_18 = genprime(18, ZZ) +F_20 = shoup_poly(20, P_18, ZZ) + + +def timeit_shoup_poly_F10_zassenhaus(): + gf_factor_sqf(F_10, P_08, ZZ, method='zassenhaus') + + +def timeit_shoup_poly_F10_shoup(): + gf_factor_sqf(F_10, P_08, ZZ, method='shoup') + + +def timeit_shoup_poly_F20_zassenhaus(): + gf_factor_sqf(F_20, P_18, ZZ, method='zassenhaus') + + +def timeit_shoup_poly_F20_shoup(): + gf_factor_sqf(F_20, P_18, ZZ, method='shoup') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_groebnertools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_groebnertools.py new file mode 100644 index 0000000000000000000000000000000000000000..e709f4f6d2cb42c0980d2e49725e01a7a2aa2b87 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_groebnertools.py @@ -0,0 +1,25 @@ +"""Benchmark of the Groebner bases algorithms. """ + + +from sympy.polys.rings import ring +from sympy.polys.domains import QQ +from sympy.polys.groebnertools import groebner + +R, x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12 = ring("x1:13", QQ) + +V = R.gens +E = [(x1, x2), (x2, x3), (x1, x4), (x1, x6), (x1, x12), (x2, x5), (x2, x7), (x3, x8), + (x3, x10), (x4, x11), (x4, x9), (x5, x6), (x6, x7), (x7, x8), (x8, x9), (x9, x10), + (x10, x11), (x11, x12), (x5, x12), (x5, x9), (x6, x10), (x7, x11), (x8, x12)] + +F3 = [ x**3 - 1 for x in V ] +Fg = [ x**2 + x*y + y**2 for x, y in E ] + +F_1 = F3 + Fg +F_2 = F3 + Fg + [x3**2 + x3*x4 + x4**2] + +def time_vertex_color_12_vertices_23_edges(): + assert groebner(F_1, R) != [1] + +def time_vertex_color_12_vertices_24_edges(): + assert groebner(F_2, R) == [1] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_solvers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..ed3ce5e246db2f5589e6a5dba9f18b7388c179c4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/benchmarks/bench_solvers.py @@ -0,0 +1,543 @@ +from sympy.polys.rings import ring +from sympy.polys.fields import field +from sympy.polys.domains import ZZ, QQ +from sympy.polys.solvers import solve_lin_sys + +# Expected times on 3.4 GHz i7: + +# In [1]: %timeit time_solve_lin_sys_189x49() +# 1 loops, best of 3: 864 ms per loop +# In [2]: %timeit time_solve_lin_sys_165x165() +# 1 loops, best of 3: 1.83 s per loop +# In [3]: %timeit time_solve_lin_sys_10x8() +# 1 loops, best of 3: 2.31 s per loop + +# Benchmark R_165: shows how fast are arithmetics in QQ. + +R_165, uk_0, uk_1, uk_2, uk_3, uk_4, uk_5, uk_6, uk_7, uk_8, uk_9, uk_10, uk_11, uk_12, uk_13, uk_14, uk_15, uk_16, uk_17, uk_18, uk_19, uk_20, uk_21, uk_22, uk_23, uk_24, uk_25, uk_26, uk_27, uk_28, uk_29, uk_30, uk_31, uk_32, uk_33, uk_34, uk_35, uk_36, uk_37, uk_38, uk_39, uk_40, uk_41, uk_42, uk_43, uk_44, uk_45, uk_46, uk_47, uk_48, uk_49, uk_50, uk_51, uk_52, uk_53, uk_54, uk_55, uk_56, uk_57, uk_58, uk_59, uk_60, uk_61, uk_62, uk_63, uk_64, uk_65, uk_66, uk_67, uk_68, uk_69, uk_70, uk_71, uk_72, uk_73, uk_74, uk_75, uk_76, uk_77, uk_78, uk_79, uk_80, uk_81, uk_82, uk_83, uk_84, uk_85, uk_86, uk_87, uk_88, uk_89, uk_90, uk_91, uk_92, uk_93, uk_94, uk_95, uk_96, uk_97, uk_98, uk_99, uk_100, uk_101, uk_102, uk_103, uk_104, uk_105, uk_106, uk_107, uk_108, uk_109, uk_110, uk_111, uk_112, uk_113, uk_114, uk_115, uk_116, uk_117, uk_118, uk_119, uk_120, uk_121, uk_122, uk_123, uk_124, uk_125, uk_126, uk_127, uk_128, uk_129, uk_130, uk_131, uk_132, uk_133, uk_134, uk_135, uk_136, uk_137, uk_138, uk_139, uk_140, uk_141, uk_142, uk_143, uk_144, uk_145, uk_146, uk_147, uk_148, uk_149, uk_150, uk_151, uk_152, uk_153, uk_154, uk_155, uk_156, uk_157, uk_158, uk_159, uk_160, uk_161, uk_162, uk_163, uk_164 = ring("uk_:165", QQ) + +def eqs_165x165(): + return [ + uk_0 + 50719*uk_1 + 2789545*uk_10 + 411400*uk_100 + 1683000*uk_101 + 166375*uk_103 + 680625*uk_104 + 2784375*uk_106 + 729*uk_109 + 456471*uk_11 + 4131*uk_110 + 11016*uk_111 + 4455*uk_112 + 18225*uk_113 + 23409*uk_115 + 62424*uk_116 + 25245*uk_117 + 103275*uk_118 + 2586669*uk_12 + 166464*uk_120 + 67320*uk_121 + 275400*uk_122 + 27225*uk_124 + 111375*uk_125 + 455625*uk_127 + 6897784*uk_13 + 132651*uk_130 + 353736*uk_131 + 143055*uk_132 + 585225*uk_133 + 943296*uk_135 + 381480*uk_136 + 1560600*uk_137 + 154275*uk_139 + 2789545*uk_14 + 631125*uk_140 + 2581875*uk_142 + 2515456*uk_145 + 1017280*uk_146 + 4161600*uk_147 + 411400*uk_149 + 11411775*uk_15 + 1683000*uk_150 + 6885000*uk_152 + 166375*uk_155 + 680625*uk_156 + 2784375*uk_158 + 11390625*uk_161 + 3025*uk_17 + 495*uk_18 + 2805*uk_19 + 55*uk_2 + 7480*uk_20 + 3025*uk_21 + 12375*uk_22 + 81*uk_24 + 459*uk_25 + 1224*uk_26 + 495*uk_27 + 2025*uk_28 + 9*uk_3 + 2601*uk_30 + 6936*uk_31 + 2805*uk_32 + 11475*uk_33 + 18496*uk_35 + 7480*uk_36 + 30600*uk_37 + 3025*uk_39 + 51*uk_4 + 12375*uk_40 + 50625*uk_42 + 130470415844959*uk_45 + 141482932855*uk_46 + 23151752649*uk_47 + 131193265011*uk_48 + 349848706696*uk_49 + 136*uk_5 + 141482932855*uk_50 + 578793816225*uk_51 + 153424975*uk_53 + 25105905*uk_54 + 142266795*uk_55 + 379378120*uk_56 + 153424975*uk_57 + 627647625*uk_58 + 55*uk_6 + 4108239*uk_60 + 23280021*uk_61 + 62080056*uk_62 + 25105905*uk_63 + 102705975*uk_64 + 131920119*uk_66 + 351786984*uk_67 + 142266795*uk_68 + 582000525*uk_69 + 225*uk_7 + 938098624*uk_71 + 379378120*uk_72 + 1552001400*uk_73 + 153424975*uk_75 + 627647625*uk_76 + 2567649375*uk_78 + 166375*uk_81 + 27225*uk_82 + 154275*uk_83 + 411400*uk_84 + 166375*uk_85 + 680625*uk_86 + 4455*uk_88 + 25245*uk_89 + 2572416961*uk_9 + 67320*uk_90 + 27225*uk_91 + 111375*uk_92 + 143055*uk_94 + 381480*uk_95 + 154275*uk_96 + 631125*uk_97 + 1017280*uk_99, + uk_0 + 50719*uk_1 + 2789545*uk_10 + 413820*uk_100 + 1633500*uk_101 + 65340*uk_102 + 178695*uk_103 + 705375*uk_104 + 28215*uk_105 + 2784375*uk_106 + 111375*uk_107 + 4455*uk_108 + 97336*uk_109 + 2333074*uk_11 + 19044*uk_110 + 279312*uk_111 + 120612*uk_112 + 476100*uk_113 + 19044*uk_114 + 3726*uk_115 + 54648*uk_116 + 23598*uk_117 + 93150*uk_118 + 3726*uk_119 + 456471*uk_12 + 801504*uk_120 + 346104*uk_121 + 1366200*uk_122 + 54648*uk_123 + 149454*uk_124 + 589950*uk_125 + 23598*uk_126 + 2328750*uk_127 + 93150*uk_128 + 3726*uk_129 + 6694908*uk_13 + 729*uk_130 + 10692*uk_131 + 4617*uk_132 + 18225*uk_133 + 729*uk_134 + 156816*uk_135 + 67716*uk_136 + 267300*uk_137 + 10692*uk_138 + 29241*uk_139 + 2890983*uk_14 + 115425*uk_140 + 4617*uk_141 + 455625*uk_142 + 18225*uk_143 + 729*uk_144 + 2299968*uk_145 + 993168*uk_146 + 3920400*uk_147 + 156816*uk_148 + 428868*uk_149 + 11411775*uk_15 + 1692900*uk_150 + 67716*uk_151 + 6682500*uk_152 + 267300*uk_153 + 10692*uk_154 + 185193*uk_155 + 731025*uk_156 + 29241*uk_157 + 2885625*uk_158 + 115425*uk_159 + 456471*uk_16 + 4617*uk_160 + 11390625*uk_161 + 455625*uk_162 + 18225*uk_163 + 729*uk_164 + 3025*uk_17 + 2530*uk_18 + 495*uk_19 + 55*uk_2 + 7260*uk_20 + 3135*uk_21 + 12375*uk_22 + 495*uk_23 + 2116*uk_24 + 414*uk_25 + 6072*uk_26 + 2622*uk_27 + 10350*uk_28 + 414*uk_29 + 46*uk_3 + 81*uk_30 + 1188*uk_31 + 513*uk_32 + 2025*uk_33 + 81*uk_34 + 17424*uk_35 + 7524*uk_36 + 29700*uk_37 + 1188*uk_38 + 3249*uk_39 + 9*uk_4 + 12825*uk_40 + 513*uk_41 + 50625*uk_42 + 2025*uk_43 + 81*uk_44 + 130470415844959*uk_45 + 141482932855*uk_46 + 118331180206*uk_47 + 23151752649*uk_48 + 339559038852*uk_49 + 132*uk_5 + 146627766777*uk_50 + 578793816225*uk_51 + 23151752649*uk_52 + 153424975*uk_53 + 128319070*uk_54 + 25105905*uk_55 + 368219940*uk_56 + 159004065*uk_57 + 627647625*uk_58 + 25105905*uk_59 + 57*uk_6 + 107321404*uk_60 + 20997666*uk_61 + 307965768*uk_62 + 132985218*uk_63 + 524941650*uk_64 + 20997666*uk_65 + 4108239*uk_66 + 60254172*uk_67 + 26018847*uk_68 + 102705975*uk_69 + 225*uk_7 + 4108239*uk_70 + 883727856*uk_71 + 381609756*uk_72 + 1506354300*uk_73 + 60254172*uk_74 + 164786031*uk_75 + 650471175*uk_76 + 26018847*uk_77 + 2567649375*uk_78 + 102705975*uk_79 + 9*uk_8 + 4108239*uk_80 + 166375*uk_81 + 139150*uk_82 + 27225*uk_83 + 399300*uk_84 + 172425*uk_85 + 680625*uk_86 + 27225*uk_87 + 116380*uk_88 + 22770*uk_89 + 2572416961*uk_9 + 333960*uk_90 + 144210*uk_91 + 569250*uk_92 + 22770*uk_93 + 4455*uk_94 + 65340*uk_95 + 28215*uk_96 + 111375*uk_97 + 4455*uk_98 + 958320*uk_99, + uk_0 + 50719*uk_1 + 2789545*uk_10 + 402380*uk_100 + 1534500*uk_101 + 313720*uk_102 + 191455*uk_103 + 730125*uk_104 + 149270*uk_105 + 2784375*uk_106 + 569250*uk_107 + 116380*uk_108 + 912673*uk_109 + 4919743*uk_11 + 432814*uk_110 + 1166716*uk_111 + 555131*uk_112 + 2117025*uk_113 + 432814*uk_114 + 205252*uk_115 + 553288*uk_116 + 263258*uk_117 + 1003950*uk_118 + 205252*uk_119 + 2333074*uk_12 + 1491472*uk_120 + 709652*uk_121 + 2706300*uk_122 + 553288*uk_123 + 337657*uk_124 + 1287675*uk_125 + 263258*uk_126 + 4910625*uk_127 + 1003950*uk_128 + 205252*uk_129 + 6289156*uk_13 + 97336*uk_130 + 262384*uk_131 + 124844*uk_132 + 476100*uk_133 + 97336*uk_134 + 707296*uk_135 + 336536*uk_136 + 1283400*uk_137 + 262384*uk_138 + 160126*uk_139 + 2992421*uk_14 + 610650*uk_140 + 124844*uk_141 + 2328750*uk_142 + 476100*uk_143 + 97336*uk_144 + 1906624*uk_145 + 907184*uk_146 + 3459600*uk_147 + 707296*uk_148 + 431644*uk_149 + 11411775*uk_15 + 1646100*uk_150 + 336536*uk_151 + 6277500*uk_152 + 1283400*uk_153 + 262384*uk_154 + 205379*uk_155 + 783225*uk_156 + 160126*uk_157 + 2986875*uk_158 + 610650*uk_159 + 2333074*uk_16 + 124844*uk_160 + 11390625*uk_161 + 2328750*uk_162 + 476100*uk_163 + 97336*uk_164 + 3025*uk_17 + 5335*uk_18 + 2530*uk_19 + 55*uk_2 + 6820*uk_20 + 3245*uk_21 + 12375*uk_22 + 2530*uk_23 + 9409*uk_24 + 4462*uk_25 + 12028*uk_26 + 5723*uk_27 + 21825*uk_28 + 4462*uk_29 + 97*uk_3 + 2116*uk_30 + 5704*uk_31 + 2714*uk_32 + 10350*uk_33 + 2116*uk_34 + 15376*uk_35 + 7316*uk_36 + 27900*uk_37 + 5704*uk_38 + 3481*uk_39 + 46*uk_4 + 13275*uk_40 + 2714*uk_41 + 50625*uk_42 + 10350*uk_43 + 2116*uk_44 + 130470415844959*uk_45 + 141482932855*uk_46 + 249524445217*uk_47 + 118331180206*uk_48 + 318979703164*uk_49 + 124*uk_5 + 151772600699*uk_50 + 578793816225*uk_51 + 118331180206*uk_52 + 153424975*uk_53 + 270585865*uk_54 + 128319070*uk_55 + 345903580*uk_56 + 164583155*uk_57 + 627647625*uk_58 + 128319070*uk_59 + 59*uk_6 + 477215071*uk_60 + 226308178*uk_61 + 610048132*uk_62 + 290264837*uk_63 + 1106942175*uk_64 + 226308178*uk_65 + 107321404*uk_66 + 289301176*uk_67 + 137651366*uk_68 + 524941650*uk_69 + 225*uk_7 + 107321404*uk_70 + 779855344*uk_71 + 371060204*uk_72 + 1415060100*uk_73 + 289301176*uk_74 + 176552839*uk_75 + 673294725*uk_76 + 137651366*uk_77 + 2567649375*uk_78 + 524941650*uk_79 + 46*uk_8 + 107321404*uk_80 + 166375*uk_81 + 293425*uk_82 + 139150*uk_83 + 375100*uk_84 + 178475*uk_85 + 680625*uk_86 + 139150*uk_87 + 517495*uk_88 + 245410*uk_89 + 2572416961*uk_9 + 661540*uk_90 + 314765*uk_91 + 1200375*uk_92 + 245410*uk_93 + 116380*uk_94 + 313720*uk_95 + 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32813*uk_32 + 34069*uk_33 + 24649*uk_34 + 64*uk_35 + 1672*uk_36 + 1736*uk_37 + 1256*uk_38 + 43681*uk_39 + 157*uk_4 + 45353*uk_40 + 32813*uk_41 + 47089*uk_42 + 34069*uk_43 + 24649*uk_44 + 106179944855977*uk_45 + 141265316367*uk_46 + 266834486471*uk_47 + 352042137613*uk_48 + 17938452872*uk_49 + 8*uk_5 + 468642081281*uk_50 + 486580534153*uk_51 + 352042137613*uk_52 + 187944057*uk_53 + 355005441*uk_54 + 468368523*uk_55 + 23865912*uk_56 + 623496951*uk_57 + 647362863*uk_58 + 468368523*uk_59 + 209*uk_6 + 670565833*uk_60 + 884696099*uk_61 + 45080056*uk_62 + 1177716463*uk_63 + 1222796519*uk_64 + 884696099*uk_65 + 1167204097*uk_66 + 59475368*uk_67 + 1553793989*uk_68 + 1613269357*uk_69 + 217*uk_7 + 1167204097*uk_70 + 3030592*uk_71 + 79174216*uk_72 + 82204808*uk_73 + 59475368*uk_74 + 2068426393*uk_75 + 2147600609*uk_76 + 1553793989*uk_77 + 2229805417*uk_78 + 1613269357*uk_79 + 157*uk_8 + 1167204097*uk_80 + 250047*uk_81 + 472311*uk_82 + 623133*uk_83 + 31752*uk_84 + 829521*uk_85 + 861273*uk_86 + 623133*uk_87 + 892143*uk_88 + 1177029*uk_89 + 2242306609*uk_9 + 59976*uk_90 + 1566873*uk_91 + 1626849*uk_92 + 1177029*uk_93 + 1552887*uk_94 + 79128*uk_95 + 2067219*uk_96 + 2146347*uk_97 + 1552887*uk_98 + 4032*uk_99, + uk_0 + 47353*uk_1 + 2983239*uk_10 + 106344*uk_100 + 109368*uk_101 + 59976*uk_102 + 2804823*uk_103 + 2884581*uk_104 + 1581867*uk_105 + 2966607*uk_106 + 1626849*uk_107 + 892143*uk_108 + 704969*uk_109 + 4214417*uk_11 + 942599*uk_110 + 63368*uk_111 + 1671331*uk_112 + 1718857*uk_113 + 942599*uk_114 + 1260329*uk_115 + 84728*uk_116 + 2234701*uk_117 + 2298247*uk_118 + 1260329*uk_119 + 5635007*uk_12 + 5696*uk_120 + 150232*uk_121 + 154504*uk_122 + 84728*uk_123 + 3962369*uk_124 + 4075043*uk_125 + 2234701*uk_126 + 4190921*uk_127 + 2298247*uk_128 + 1260329*uk_129 + 378824*uk_13 + 1685159*uk_130 + 113288*uk_131 + 2987971*uk_132 + 3072937*uk_133 + 1685159*uk_134 + 7616*uk_135 + 200872*uk_136 + 206584*uk_137 + 113288*uk_138 + 5297999*uk_139 + 9991483*uk_14 + 5448653*uk_140 + 2987971*uk_141 + 5603591*uk_142 + 3072937*uk_143 + 1685159*uk_144 + 512*uk_145 + 13504*uk_146 + 13888*uk_147 + 7616*uk_148 + 356168*uk_149 + 10275601*uk_15 + 366296*uk_150 + 200872*uk_151 + 376712*uk_152 + 206584*uk_153 + 113288*uk_154 + 9393931*uk_155 + 9661057*uk_156 + 5297999*uk_157 + 9935779*uk_158 + 5448653*uk_159 + 5635007*uk_16 + 2987971*uk_160 + 10218313*uk_161 + 5603591*uk_162 + 3072937*uk_163 + 1685159*uk_164 + 3969*uk_17 + 5607*uk_18 + 7497*uk_19 + 63*uk_2 + 504*uk_20 + 13293*uk_21 + 13671*uk_22 + 7497*uk_23 + 7921*uk_24 + 10591*uk_25 + 712*uk_26 + 18779*uk_27 + 19313*uk_28 + 10591*uk_29 + 89*uk_3 + 14161*uk_30 + 952*uk_31 + 25109*uk_32 + 25823*uk_33 + 14161*uk_34 + 64*uk_35 + 1688*uk_36 + 1736*uk_37 + 952*uk_38 + 44521*uk_39 + 119*uk_4 + 45787*uk_40 + 25109*uk_41 + 47089*uk_42 + 25823*uk_43 + 14161*uk_44 + 106179944855977*uk_45 + 141265316367*uk_46 + 199565288201*uk_47 + 266834486471*uk_48 + 17938452872*uk_49 + 8*uk_5 + 473126694499*uk_50 + 486580534153*uk_51 + 266834486471*uk_52 + 187944057*uk_53 + 265508271*uk_54 + 355005441*uk_55 + 23865912*uk_56 + 629463429*uk_57 + 647362863*uk_58 + 355005441*uk_59 + 211*uk_6 + 375083113*uk_60 + 501515623*uk_61 + 33715336*uk_62 + 889241987*uk_63 + 914528489*uk_64 + 501515623*uk_65 + 670565833*uk_66 + 45080056*uk_67 + 1188986477*uk_68 + 1222796519*uk_69 + 217*uk_7 + 670565833*uk_70 + 3030592*uk_71 + 79931864*uk_72 + 82204808*uk_73 + 45080056*uk_74 + 2108202913*uk_75 + 2168151811*uk_76 + 1188986477*uk_77 + 2229805417*uk_78 + 1222796519*uk_79 + 119*uk_8 + 670565833*uk_80 + 250047*uk_81 + 353241*uk_82 + 472311*uk_83 + 31752*uk_84 + 837459*uk_85 + 861273*uk_86 + 472311*uk_87 + 499023*uk_88 + 667233*uk_89 + 2242306609*uk_9 + 44856*uk_90 + 1183077*uk_91 + 1216719*uk_92 + 667233*uk_93 + 892143*uk_94 + 59976*uk_95 + 1581867*uk_96 + 1626849*uk_97 + 892143*uk_98 + 4032*uk_99, + uk_0 + 47353*uk_1 + 2983239*uk_10 + 107352*uk_100 + 109368*uk_101 + 44856*uk_102 + 2858247*uk_103 + 2911923*uk_104 + 1194291*uk_105 + 2966607*uk_106 + 1216719*uk_107 + 499023*uk_108 + 300763*uk_109 + 3172651*uk_11 + 399521*uk_110 + 35912*uk_111 + 956157*uk_112 + 974113*uk_113 + 399521*uk_114 + 530707*uk_115 + 47704*uk_116 + 1270119*uk_117 + 1293971*uk_118 + 530707*uk_119 + 4214417*uk_12 + 4288*uk_120 + 114168*uk_121 + 116312*uk_122 + 47704*uk_123 + 3039723*uk_124 + 3096807*uk_125 + 1270119*uk_126 + 3154963*uk_127 + 1293971*uk_128 + 530707*uk_129 + 378824*uk_13 + 704969*uk_130 + 63368*uk_131 + 1687173*uk_132 + 1718857*uk_133 + 704969*uk_134 + 5696*uk_135 + 151656*uk_136 + 154504*uk_137 + 63368*uk_138 + 4037841*uk_139 + 10086189*uk_14 + 4113669*uk_140 + 1687173*uk_141 + 4190921*uk_142 + 1718857*uk_143 + 704969*uk_144 + 512*uk_145 + 13632*uk_146 + 13888*uk_147 + 5696*uk_148 + 362952*uk_149 + 10275601*uk_15 + 369768*uk_150 + 151656*uk_151 + 376712*uk_152 + 154504*uk_153 + 63368*uk_154 + 9663597*uk_155 + 9845073*uk_156 + 4037841*uk_157 + 10029957*uk_158 + 4113669*uk_159 + 4214417*uk_16 + 1687173*uk_160 + 10218313*uk_161 + 4190921*uk_162 + 1718857*uk_163 + 704969*uk_164 + 3969*uk_17 + 4221*uk_18 + 5607*uk_19 + 63*uk_2 + 504*uk_20 + 13419*uk_21 + 13671*uk_22 + 5607*uk_23 + 4489*uk_24 + 5963*uk_25 + 536*uk_26 + 14271*uk_27 + 14539*uk_28 + 5963*uk_29 + 67*uk_3 + 7921*uk_30 + 712*uk_31 + 18957*uk_32 + 19313*uk_33 + 7921*uk_34 + 64*uk_35 + 1704*uk_36 + 1736*uk_37 + 712*uk_38 + 45369*uk_39 + 89*uk_4 + 46221*uk_40 + 18957*uk_41 + 47089*uk_42 + 19313*uk_43 + 7921*uk_44 + 106179944855977*uk_45 + 141265316367*uk_46 + 150234542803*uk_47 + 199565288201*uk_48 + 17938452872*uk_49 + 8*uk_5 + 477611307717*uk_50 + 486580534153*uk_51 + 199565288201*uk_52 + 187944057*uk_53 + 199877013*uk_54 + 265508271*uk_55 + 23865912*uk_56 + 635429907*uk_57 + 647362863*uk_58 + 265508271*uk_59 + 213*uk_6 + 212567617*uk_60 + 282365939*uk_61 + 25381208*uk_62 + 675774663*uk_63 + 688465267*uk_64 + 282365939*uk_65 + 375083113*uk_66 + 33715336*uk_67 + 897670821*uk_68 + 914528489*uk_69 + 217*uk_7 + 375083113*uk_70 + 3030592*uk_71 + 80689512*uk_72 + 82204808*uk_73 + 33715336*uk_74 + 2148358257*uk_75 + 2188703013*uk_76 + 897670821*uk_77 + 2229805417*uk_78 + 914528489*uk_79 + 89*uk_8 + 375083113*uk_80 + 250047*uk_81 + 265923*uk_82 + 353241*uk_83 + 31752*uk_84 + 845397*uk_85 + 861273*uk_86 + 353241*uk_87 + 282807*uk_88 + 375669*uk_89 + 2242306609*uk_9 + 33768*uk_90 + 899073*uk_91 + 915957*uk_92 + 375669*uk_93 + 499023*uk_94 + 44856*uk_95 + 1194291*uk_96 + 1216719*uk_97 + 499023*uk_98 + 4032*uk_99, + uk_0 + 47353*uk_1 + 2983239*uk_10 + 108360*uk_100 + 109368*uk_101 + 33768*uk_102 + 2912175*uk_103 + 2939265*uk_104 + 907515*uk_105 + 2966607*uk_106 + 915957*uk_107 + 282807*uk_108 + 148877*uk_109 + 2509709*uk_11 + 188203*uk_110 + 22472*uk_111 + 603935*uk_112 + 609553*uk_113 + 188203*uk_114 + 237917*uk_115 + 28408*uk_116 + 763465*uk_117 + 770567*uk_118 + 237917*uk_119 + 3172651*uk_12 + 3392*uk_120 + 91160*uk_121 + 92008*uk_122 + 28408*uk_123 + 2449925*uk_124 + 2472715*uk_125 + 763465*uk_126 + 2495717*uk_127 + 770567*uk_128 + 237917*uk_129 + 378824*uk_13 + 300763*uk_130 + 35912*uk_131 + 965135*uk_132 + 974113*uk_133 + 300763*uk_134 + 4288*uk_135 + 115240*uk_136 + 116312*uk_137 + 35912*uk_138 + 3097075*uk_139 + 10180895*uk_14 + 3125885*uk_140 + 965135*uk_141 + 3154963*uk_142 + 974113*uk_143 + 300763*uk_144 + 512*uk_145 + 13760*uk_146 + 13888*uk_147 + 4288*uk_148 + 369800*uk_149 + 10275601*uk_15 + 373240*uk_150 + 115240*uk_151 + 376712*uk_152 + 116312*uk_153 + 35912*uk_154 + 9938375*uk_155 + 10030825*uk_156 + 3097075*uk_157 + 10124135*uk_158 + 3125885*uk_159 + 3172651*uk_16 + 965135*uk_160 + 10218313*uk_161 + 3154963*uk_162 + 974113*uk_163 + 300763*uk_164 + 3969*uk_17 + 3339*uk_18 + 4221*uk_19 + 63*uk_2 + 504*uk_20 + 13545*uk_21 + 13671*uk_22 + 4221*uk_23 + 2809*uk_24 + 3551*uk_25 + 424*uk_26 + 11395*uk_27 + 11501*uk_28 + 3551*uk_29 + 53*uk_3 + 4489*uk_30 + 536*uk_31 + 14405*uk_32 + 14539*uk_33 + 4489*uk_34 + 64*uk_35 + 1720*uk_36 + 1736*uk_37 + 536*uk_38 + 46225*uk_39 + 67*uk_4 + 46655*uk_40 + 14405*uk_41 + 47089*uk_42 + 14539*uk_43 + 4489*uk_44 + 106179944855977*uk_45 + 141265316367*uk_46 + 118842250277*uk_47 + 150234542803*uk_48 + 17938452872*uk_49 + 8*uk_5 + 482095920935*uk_50 + 486580534153*uk_51 + 150234542803*uk_52 + 187944057*uk_53 + 158111667*uk_54 + 199877013*uk_55 + 23865912*uk_56 + 641396385*uk_57 + 647362863*uk_58 + 199877013*uk_59 + 215*uk_6 + 133014577*uk_60 + 168150503*uk_61 + 20077672*uk_62 + 539587435*uk_63 + 544606853*uk_64 + 168150503*uk_65 + 212567617*uk_66 + 25381208*uk_67 + 682119965*uk_68 + 688465267*uk_69 + 217*uk_7 + 212567617*uk_70 + 3030592*uk_71 + 81447160*uk_72 + 82204808*uk_73 + 25381208*uk_74 + 2188892425*uk_75 + 2209254215*uk_76 + 682119965*uk_77 + 2229805417*uk_78 + 688465267*uk_79 + 67*uk_8 + 212567617*uk_80 + 250047*uk_81 + 210357*uk_82 + 265923*uk_83 + 31752*uk_84 + 853335*uk_85 + 861273*uk_86 + 265923*uk_87 + 176967*uk_88 + 223713*uk_89 + 2242306609*uk_9 + 26712*uk_90 + 717885*uk_91 + 724563*uk_92 + 223713*uk_93 + 282807*uk_94 + 33768*uk_95 + 907515*uk_96 + 915957*uk_97 + 282807*uk_98 + 4032*uk_99, + uk_0 + 47353*uk_1 + 2983239*uk_10 + 109368*uk_100 + 109368*uk_101 + 26712*uk_102 + 2966607*uk_103 + 2966607*uk_104 + 724563*uk_105 + 2966607*uk_106 + 724563*uk_107 + 176967*uk_108 + 103823*uk_109 + 2225591*uk_11 + 117077*uk_110 + 17672*uk_111 + 479353*uk_112 + 479353*uk_113 + 117077*uk_114 + 132023*uk_115 + 19928*uk_116 + 540547*uk_117 + 540547*uk_118 + 132023*uk_119 + 2509709*uk_12 + 3008*uk_120 + 81592*uk_121 + 81592*uk_122 + 19928*uk_123 + 2213183*uk_124 + 2213183*uk_125 + 540547*uk_126 + 2213183*uk_127 + 540547*uk_128 + 132023*uk_129 + 378824*uk_13 + 148877*uk_130 + 22472*uk_131 + 609553*uk_132 + 609553*uk_133 + 148877*uk_134 + 3392*uk_135 + 92008*uk_136 + 92008*uk_137 + 22472*uk_138 + 2495717*uk_139 + 10275601*uk_14 + 2495717*uk_140 + 609553*uk_141 + 2495717*uk_142 + 609553*uk_143 + 148877*uk_144 + 512*uk_145 + 13888*uk_146 + 13888*uk_147 + 3392*uk_148 + 376712*uk_149 + 10275601*uk_15 + 376712*uk_150 + 92008*uk_151 + 376712*uk_152 + 92008*uk_153 + 22472*uk_154 + 10218313*uk_155 + 10218313*uk_156 + 2495717*uk_157 + 10218313*uk_158 + 2495717*uk_159 + 2509709*uk_16 + 609553*uk_160 + 10218313*uk_161 + 2495717*uk_162 + 609553*uk_163 + 148877*uk_164 + 3969*uk_17 + 2961*uk_18 + 3339*uk_19 + 63*uk_2 + 504*uk_20 + 13671*uk_21 + 13671*uk_22 + 3339*uk_23 + 2209*uk_24 + 2491*uk_25 + 376*uk_26 + 10199*uk_27 + 10199*uk_28 + 2491*uk_29 + 47*uk_3 + 2809*uk_30 + 424*uk_31 + 11501*uk_32 + 11501*uk_33 + 2809*uk_34 + 64*uk_35 + 1736*uk_36 + 1736*uk_37 + 424*uk_38 + 47089*uk_39 + 53*uk_4 + 47089*uk_40 + 11501*uk_41 + 47089*uk_42 + 11501*uk_43 + 2809*uk_44 + 106179944855977*uk_45 + 141265316367*uk_46 + 105388410623*uk_47 + 118842250277*uk_48 + 17938452872*uk_49 + 8*uk_5 + 486580534153*uk_50 + 486580534153*uk_51 + 118842250277*uk_52 + 187944057*uk_53 + 140212233*uk_54 + 158111667*uk_55 + 23865912*uk_56 + 647362863*uk_57 + 647362863*uk_58 + 158111667*uk_59 + 217*uk_6 + 104602777*uk_60 + 117956323*uk_61 + 17804728*uk_62 + 482953247*uk_63 + 482953247*uk_64 + 117956323*uk_65 + 133014577*uk_66 + 20077672*uk_67 + 544606853*uk_68 + 544606853*uk_69 + 217*uk_7 + 133014577*uk_70 + 3030592*uk_71 + 82204808*uk_72 + 82204808*uk_73 + 20077672*uk_74 + 2229805417*uk_75 + 2229805417*uk_76 + 544606853*uk_77 + 2229805417*uk_78 + 544606853*uk_79 + 53*uk_8 + 133014577*uk_80 + 250047*uk_81 + 186543*uk_82 + 210357*uk_83 + 31752*uk_84 + 861273*uk_85 + 861273*uk_86 + 210357*uk_87 + 139167*uk_88 + 156933*uk_89 + 2242306609*uk_9 + 23688*uk_90 + 642537*uk_91 + 642537*uk_92 + 156933*uk_93 + 176967*uk_94 + 26712*uk_95 + 724563*uk_96 + 724563*uk_97 + 176967*uk_98 + 4032*uk_99, + ] + +def sol_165x165(): + return { + uk_0: -QQ(295441,1683)*uk_2 - QQ(175799,1683)*uk_7 + QQ(2401696807,1)*uk_9 - QQ(9606787228,1683)*uk_10 + QQ(9606787228,1683)*uk_15 - QQ(29030443,1683)*uk_17 - QQ(5965893,187)*uk_22 + QQ(262901,99)*uk_42 + QQ(235539209256104,1)*uk_45 - QQ(232597130667529,1683)*uk_46 + QQ(1364372733998209,1683)*uk_51 - QQ(1133600892904,1683)*uk_53 - QQ(172922170104,187)*uk_58 + QQ(249776467928,99)*uk_78 - QQ(2401889209,1683)*uk_81 - QQ(636292759,187)*uk_86 - QQ(1034157281,187)*uk_106 + QQ(10558824289,1683)*uk_161, + uk_1: QQ(4,1683)*uk_2 - QQ(4,1683)*uk_7 - QQ(98072,1)*uk_9 + QQ(96847,1683)*uk_10 - QQ(568087,1683)*uk_15 + QQ(472,1683)*uk_17 + QQ(72,187)*uk_22 - QQ(104,99)*uk_42 - QQ(7216420377,1)*uk_45 - QQ(108808244,1683)*uk_46 - QQ(46106641036,1683)*uk_51 + QQ(17259541,1683)*uk_53 + QQ(1095291,187)*uk_58 - QQ(9936587,99)*uk_78 + QQ(41836,1683)*uk_81 + QQ(10036,187)*uk_86 + QQ(10124,187)*uk_106 - QQ(8,1)*uk_149 - QQ(586156,1683)*uk_161, + uk_3: -QQ(295441,1683)*uk_18 - QQ(175799,1683)*uk_28 + QQ(2401696807,1)*uk_47 - QQ(9606787228,1683)*uk_54 + QQ(9606787228,1683)*uk_64 - QQ(29030443,1683)*uk_82 - QQ(5965893,187)*uk_92 + QQ(262901,99)*uk_127 + QQ(8,1)*uk_149, + uk_4: -QQ(295441,1683)*uk_19 + QQ(1602583,3366)*uk_29 - QQ(175799,1683)*uk_33 - QQ(45670,99)*uk_34 - QQ(76006,187)*uk_38 + QQ(295441,1683)*uk_41 - QQ(45670,99)*uk_44 + QQ(2401696807,1)*uk_48 - QQ(9606787228,1683)*uk_55 + QQ(74452601017,3366)*uk_65 + QQ(9606787228,1683)*uk_69 - QQ(2401696807,99)*uk_70 - QQ(4803393614,187)*uk_74 + QQ(9606787228,1683)*uk_77 - QQ(2401696807,99)*uk_80 - QQ(29030443,1683)*uk_83 + QQ(11596905,374)*uk_93 - QQ(5965893,187)*uk_97 - QQ(769658,33)*uk_98 - QQ(17335370,1683)*uk_102 + QQ(29030443,1683)*uk_105 - QQ(769658,33)*uk_108 + QQ(77314807,3366)*uk_114 + QQ(750229,198)*uk_119 + QQ(72457964,1683)*uk_123 + QQ(11596905,374)*uk_126 + QQ(31304645,306)*uk_128 + QQ(750229,198)*uk_129 - QQ(3191393,99)*uk_134 - QQ(647642,9)*uk_138 - QQ(769658,33)*uk_141 + QQ(262901,99)*uk_142 - QQ(10478626,99)*uk_143 - QQ(3191393,99)*uk_144 - QQ(20480616,187)*uk_148 - QQ(17335370,1683)*uk_151 - QQ(174199750,1683)*uk_153 - QQ(647642,9)*uk_154 + QQ(29030443,1683)*uk_157 + QQ(5965893,187)*uk_159 - QQ(769658,33)*uk_160 - QQ(10478626,99)*uk_163 - QQ(3191393,99)*uk_164, + uk_5: -QQ(295441,1683)*uk_20 - QQ(175799,1683)*uk_37 + QQ(2401696807,1)*uk_49 - QQ(9606787228,1683)*uk_56 + QQ(9606787228,1683)*uk_73 - QQ(29030443,1683)*uk_84 - QQ(5965893,187)*uk_101 + QQ(262901,99)*uk_152, + uk_6: -QQ(295441,1683)*uk_21 - QQ(175799,1683)*uk_40 + QQ(2401696807,1)*uk_50 - QQ(9606787228,1683)*uk_57 + QQ(9606787228,1683)*uk_76 - QQ(29030443,1683)*uk_85 - QQ(5965893,187)*uk_104 + QQ(262901,99)*uk_158, + uk_8: -QQ(295441,1683)*uk_23 - QQ(1602583,3366)*uk_29 + QQ(45670,99)*uk_34 + QQ(76006,187)*uk_38 - QQ(295441,1683)*uk_41 - QQ(175799,1683)*uk_43 + QQ(45670,99)*uk_44 + QQ(2401696807,1)*uk_52 - QQ(9606787228,1683)*uk_59 - QQ(74452601017,3366)*uk_65 + QQ(2401696807,99)*uk_70 + QQ(4803393614,187)*uk_74 - QQ(9606787228,1683)*uk_77 + QQ(9606787228,1683)*uk_79 + QQ(2401696807,99)*uk_80 - QQ(29030443,1683)*uk_87 - QQ(11596905,374)*uk_93 + QQ(769658,33)*uk_98 + QQ(17335370,1683)*uk_102 - QQ(29030443,1683)*uk_105 - QQ(5965893,187)*uk_107 + QQ(769658,33)*uk_108 - QQ(77314807,3366)*uk_114 - QQ(750229,198)*uk_119 - QQ(72457964,1683)*uk_123 - QQ(11596905,374)*uk_126 - QQ(31304645,306)*uk_128 - QQ(750229,198)*uk_129 + QQ(3191393,99)*uk_134 + QQ(647642,9)*uk_138 + QQ(769658,33)*uk_141 + QQ(10478626,99)*uk_143 + QQ(3191393,99)*uk_144 + QQ(20480616,187)*uk_148 + QQ(17335370,1683)*uk_151 + QQ(174199750,1683)*uk_153 + QQ(647642,9)*uk_154 - QQ(29030443,1683)*uk_157 - QQ(5965893,187)*uk_159 + QQ(769658,33)*uk_160 + QQ(262901,99)*uk_162 + QQ(10478626,99)*uk_163 + QQ(3191393,99)*uk_164, + uk_11: QQ(4,1683)*uk_18 - QQ(4,1683)*uk_28 - QQ(98072,1)*uk_47 + QQ(96847,1683)*uk_54 - QQ(568087,1683)*uk_64 + QQ(472,1683)*uk_82 + QQ(72,187)*uk_92 - QQ(104,99)*uk_127, + uk_12: QQ(4,1683)*uk_19 - QQ(31,3366)*uk_29 - QQ(4,1683)*uk_33 + QQ(1,99)*uk_34 + QQ(2,187)*uk_38 - QQ(4,1683)*uk_41 + QQ(1,99)*uk_44 - QQ(98072,1)*uk_48 + QQ(96847,1683)*uk_55 - QQ(1437649,3366)*uk_65 - QQ(568087,1683)*uk_69 + QQ(52402,99)*uk_70 + QQ(120138,187)*uk_74 - QQ(96847,1683)*uk_77 + QQ(52402,99)*uk_80 + QQ(472,1683)*uk_83 - QQ(225,374)*uk_93 + QQ(72,187)*uk_97 + QQ(17,33)*uk_98 + QQ(590,1683)*uk_102 - QQ(472,1683)*uk_105 + QQ(17,33)*uk_108 - QQ(1519,3366)*uk_114 - QQ(13,198)*uk_119 - QQ(1388,1683)*uk_123 - QQ(225,374)*uk_126 - QQ(605,306)*uk_128 - QQ(13,198)*uk_129 + QQ(68,99)*uk_134 + QQ(14,9)*uk_138 + QQ(17,33)*uk_141 - QQ(104,99)*uk_142 + QQ(229,99)*uk_143 + QQ(68,99)*uk_144 + QQ(472,187)*uk_148 + QQ(590,1683)*uk_151 + QQ(4450,1683)*uk_153 + QQ(14,9)*uk_154 - QQ(472,1683)*uk_157 - QQ(72,187)*uk_159 + QQ(17,33)*uk_160 + QQ(229,99)*uk_163 + QQ(68,99)*uk_164, + uk_13: QQ(4,1683)*uk_20 - QQ(4,1683)*uk_37 - QQ(98072,1)*uk_49 + QQ(96847,1683)*uk_56 - QQ(568087,1683)*uk_73 + QQ(472,1683)*uk_84 + QQ(72,187)*uk_101 - QQ(104,99)*uk_152, + uk_14: QQ(4,1683)*uk_21 - QQ(4,1683)*uk_40 - QQ(98072,1)*uk_50 + QQ(96847,1683)*uk_57 - QQ(568087,1683)*uk_76 + QQ(472,1683)*uk_85 + QQ(72,187)*uk_104 - QQ(104,99)*uk_158, + uk_16: QQ(4,1683)*uk_23 + QQ(31,3366)*uk_29 - QQ(1,99)*uk_34 - QQ(2,187)*uk_38 + QQ(4,1683)*uk_41 - QQ(4,1683)*uk_43 - QQ(1,99)*uk_44 - QQ(98072,1)*uk_52 + QQ(96847,1683)*uk_59 + QQ(1437649,3366)*uk_65 - QQ(52402,99)*uk_70 - QQ(120138,187)*uk_74 + QQ(96847,1683)*uk_77 - QQ(568087,1683)*uk_79 - QQ(52402,99)*uk_80 + QQ(472,1683)*uk_87 + QQ(225,374)*uk_93 - QQ(17,33)*uk_98 - QQ(590,1683)*uk_102 + QQ(472,1683)*uk_105 + QQ(72,187)*uk_107 - QQ(17,33)*uk_108 + QQ(1519,3366)*uk_114 + QQ(13,198)*uk_119 + QQ(1388,1683)*uk_123 + QQ(225,374)*uk_126 + QQ(605,306)*uk_128 + QQ(13,198)*uk_129 - QQ(68,99)*uk_134 - QQ(14,9)*uk_138 - QQ(17,33)*uk_141 - QQ(229,99)*uk_143 - QQ(68,99)*uk_144 - QQ(472,187)*uk_148 - QQ(590,1683)*uk_151 - QQ(4450,1683)*uk_153 - QQ(14,9)*uk_154 + QQ(472,1683)*uk_157 + QQ(72,187)*uk_159 - QQ(17,33)*uk_160 - QQ(104,99)*uk_162 - QQ(229,99)*uk_163 - QQ(68,99)*uk_164, + uk_24: -QQ(295441,1683)*uk_88 - QQ(175799,1683)*uk_113, + uk_26: -QQ(295441,1683)*uk_90 - QQ(175799,1683)*uk_122, uk_25: -uk_29 - QQ(295441,1683)*uk_89 - QQ(295441,1683)*uk_93 - QQ(175799,1683)*uk_118 - QQ(175799,1683)*uk_128, + uk_27: -QQ(295441,1683)*uk_91 - QQ(175799,1683)*uk_125 - QQ(4,1)*uk_149, + uk_30: -uk_34 - uk_44 - QQ(295441,1683)*uk_94 - QQ(295441,1683)*uk_98 - QQ(295441,1683)*uk_108 - QQ(175799,1683)*uk_133 - QQ(175799,1683)*uk_143 - QQ(175799,1683)*uk_163, + uk_31: -uk_38 - QQ(295441,1683)*uk_95 - QQ(295441,1683)*uk_102 - QQ(175799,1683)*uk_137 - QQ(175799,1683)*uk_153, + uk_32: -uk_41 - QQ(295441,1683)*uk_96 - QQ(295441,1683)*uk_105 - QQ(175799,1683)*uk_140 + QQ(4,1)*uk_149 - QQ(175799,1683)*uk_159, + uk_35: -QQ(295441,1683)*uk_99 - QQ(175799,1683)*uk_147, + uk_36: -QQ(295441,1683)*uk_100 - QQ(2,1)*uk_149 - QQ(175799,1683)*uk_150, + uk_39: -QQ(295441,1683)*uk_103 - QQ(175799,1683)*uk_156, + uk_60: QQ(4,1683)*uk_88 - QQ(4,1683)*uk_113, + uk_61: -uk_65 + QQ(4,1683)*uk_89 + QQ(4,1683)*uk_93 - QQ(4,1683)*uk_118 - QQ(4,1683)*uk_128, + uk_62: QQ(4,1683)*uk_90 - QQ(4,1683)*uk_122, + uk_63: QQ(4,1683)*uk_91 - QQ(4,1683)*uk_125, + uk_66: -uk_70 - uk_80 + QQ(4,1683)*uk_94 + QQ(4,1683)*uk_98 + QQ(4,1683)*uk_108 - QQ(4,1683)*uk_133 - QQ(4,1683)*uk_143 - QQ(4,1683)*uk_163, + uk_67: -uk_74 + QQ(4,1683)*uk_95 + QQ(4,1683)*uk_102 - QQ(4,1683)*uk_137 - QQ(4,1683)*uk_153, + uk_68: -uk_77 + QQ(4,1683)*uk_96 + QQ(4,1683)*uk_105 - QQ(4,1683)*uk_140 - QQ(4,1683)*uk_159, + uk_71: QQ(4,1683)*uk_99 - QQ(4,1683)*uk_147, + uk_72: QQ(4,1683)*uk_100 - QQ(4,1683)*uk_150, + uk_75: QQ(4,1683)*uk_103 - QQ(4,1683)*uk_156, + uk_109: 0, + uk_110: -uk_114, + uk_111: 0, + uk_112: 0, + uk_115: -uk_119 - uk_129, + uk_116: -uk_123, + uk_117: -uk_126, + uk_120: 0, + uk_121: 0, + uk_124: 0, + uk_130: -uk_134 - uk_144 - uk_164, + uk_131: -uk_138 - uk_154, + uk_132: -uk_141 - uk_160, + uk_135: -uk_148, + uk_136: -uk_151, + uk_139: -uk_157, + uk_145: 0, + uk_146: 0, + uk_155: 0, + } + +def time_eqs_165x165(): + if len(eqs_165x165()) != 165: + raise ValueError("length should be 165") + +def time_solve_lin_sys_165x165(): + eqs = eqs_165x165() + sol = solve_lin_sys(eqs, R_165) + if sol != sol_165x165(): + raise ValueError("Value should be equal") + +def time_verify_sol_165x165(): + eqs = eqs_165x165() + sol = sol_165x165() + zeros = [ eq.compose(sol) for eq in eqs ] + if not all(zero == 0 for zero in zeros): + raise ValueError("All should be 0") + +def time_to_expr_eqs_165x165(): + eqs = eqs_165x165() + assert [ R_165.from_expr(eq.as_expr()) for eq in eqs ] == eqs + +# Benchmark R_49: shows how fast are arithmetics in rational function fields. +F_abc, a, b, c = field("a,b,c", ZZ) +R_49, k1, k2, k3, k4, k5, k6, k7, k8, k9, k10, k11, k12, k13, k14, k15, k16, k17, k18, k19, k20, k21, k22, k23, k24, k25, k26, k27, k28, k29, k30, k31, k32, k33, k34, k35, k36, k37, k38, k39, k40, k41, k42, k43, k44, k45, k46, k47, k48, k49 = ring("k1:50", F_abc) + +def eqs_189x49(): + return [ + -b*k8/a+c*k8/a, + -b*k11/a+c*k11/a, + -b*k10/a+c*k10/a+k2, + -k3-b*k9/a+c*k9/a, + -b*k14/a+c*k14/a, + -b*k15/a+c*k15/a, + -b*k18/a+c*k18/a-k2, + -b*k17/a+c*k17/a, + -b*k16/a+c*k16/a+k4, + -b*k13/a+c*k13/a-b*k21/a+c*k21/a+b*k5/a-c*k5/a, + b*k44/a-c*k44/a, + -b*k45/a+c*k45/a, + -b*k20/a+c*k20/a, + -b*k44/a+c*k44/a, + b*k46/a-c*k46/a, + b**2*k47/a**2-2*b*c*k47/a**2+c**2*k47/a**2, + k3, + -k4, + -b*k12/a+c*k12/a-a*k6/b+c*k6/b, + -b*k19/a+c*k19/a+a*k7/c-b*k7/c, + b*k45/a-c*k45/a, + -b*k46/a+c*k46/a, + -k48+c*k48/a+c*k48/b-c**2*k48/(a*b), + -k49+b*k49/a+b*k49/c-b**2*k49/(a*c), + a*k1/b-c*k1/b, + a*k4/b-c*k4/b, + a*k3/b-c*k3/b+k9, + -k10+a*k2/b-c*k2/b, + a*k7/b-c*k7/b, + -k9, + k11, + b*k12/a-c*k12/a+a*k6/b-c*k6/b, + a*k15/b-c*k15/b, + k10+a*k18/b-c*k18/b, + -k11+a*k17/b-c*k17/b, + a*k16/b-c*k16/b, + -a*k13/b+c*k13/b+a*k21/b-c*k21/b+a*k5/b-c*k5/b, + -a*k44/b+c*k44/b, + a*k45/b-c*k45/b, + a*k14/c-b*k14/c+a*k20/b-c*k20/b, + a*k44/b-c*k44/b, + -a*k46/b+c*k46/b, + -k47+c*k47/a+c*k47/b-c**2*k47/(a*b), + a*k19/b-c*k19/b, + -a*k45/b+c*k45/b, + a*k46/b-c*k46/b, + a**2*k48/b**2-2*a*c*k48/b**2+c**2*k48/b**2, + -k49+a*k49/b+a*k49/c-a**2*k49/(b*c), + k16, + -k17, + -a*k1/c+b*k1/c, + -k16-a*k4/c+b*k4/c, + -a*k3/c+b*k3/c, + k18-a*k2/c+b*k2/c, + b*k19/a-c*k19/a-a*k7/c+b*k7/c, + -a*k6/c+b*k6/c, + -a*k8/c+b*k8/c, + -a*k11/c+b*k11/c+k17, + -a*k10/c+b*k10/c-k18, + -a*k9/c+b*k9/c, + -a*k14/c+b*k14/c-a*k20/b+c*k20/b, + -a*k13/c+b*k13/c+a*k21/c-b*k21/c-a*k5/c+b*k5/c, + a*k44/c-b*k44/c, + -a*k45/c+b*k45/c, + -a*k44/c+b*k44/c, + a*k46/c-b*k46/c, + -k47+b*k47/a+b*k47/c-b**2*k47/(a*c), + -a*k12/c+b*k12/c, + a*k45/c-b*k45/c, + -a*k46/c+b*k46/c, + -k48+a*k48/b+a*k48/c-a**2*k48/(b*c), + a**2*k49/c**2-2*a*b*k49/c**2+b**2*k49/c**2, + k8, + k11, + -k15, + k10-k18, + -k17, + k9, + -k16, + -k29, + k14-k32, + -k21+k23-k31, + -k24-k30, + -k35, + k44, + -k45, + k36, + k13-k23+k39, + -k20+k38, + k25+k37, + b*k26/a-c*k26/a-k34+k42, + -2*k44, + k45, + k46, + b*k47/a-c*k47/a, + k41, + k44, + -k46, + -b*k47/a+c*k47/a, + k12+k24, + -k19-k25, + -a*k27/b+c*k27/b-k33, + k45, + -k46, + -a*k48/b+c*k48/b, + a*k28/c-b*k28/c+k40, + -k45, + k46, + a*k48/b-c*k48/b, + a*k49/c-b*k49/c, + -a*k49/c+b*k49/c, + -k1, + -k4, + -k3, + k15, + k18-k2, + k17, + k16, + k22, + k25-k7, + k24+k30, + k21+k23-k31, + k28, + -k44, + k45, + -k30-k6, + k20+k32, + k27+b*k33/a-c*k33/a, + k44, + -k46, + -b*k47/a+c*k47/a, + -k36, + k31-k39-k5, + -k32-k38, + k19-k37, + k26-a*k34/b+c*k34/b-k42, + k44, + -2*k45, + k46, + a*k48/b-c*k48/b, + a*k35/c-b*k35/c-k41, + -k44, + k46, + b*k47/a-c*k47/a, + -a*k49/c+b*k49/c, + -k40, + k45, + -k46, + -a*k48/b+c*k48/b, + a*k49/c-b*k49/c, + k1, + k4, + k3, + -k8, + -k11, + -k10+k2, + -k9, + k37+k7, + -k14-k38, + -k22, + -k25-k37, + -k24+k6, + -k13-k23+k39, + -k28+b*k40/a-c*k40/a, + k44, + -k45, + -k27, + -k44, + k46, + b*k47/a-c*k47/a, + k29, + k32+k38, + k31-k39+k5, + -k12+k30, + k35-a*k41/b+c*k41/b, + -k44, + k45, + -k26+k34+a*k42/c-b*k42/c, + k44, + k45, + -2*k46, + -b*k47/a+c*k47/a, + -a*k48/b+c*k48/b, + a*k49/c-b*k49/c, + k33, + -k45, + k46, + a*k48/b-c*k48/b, + -a*k49/c+b*k49/c, + ] + +def sol_189x49(): + return { + k49: 0, k48: 0, k47: 0, k46: 0, k45: 0, k44: 0, k41: 0, k40: 0, + k38: 0, k37: 0, k36: 0, k35: 0, k33: 0, k32: 0, k30: 0, k29: 0, + k28: 0, k27: 0, k25: 0, k24: 0, k22: 0, k21: 0, k20: 0, k19: 0, + k18: 0, k17: 0, k16: 0, k15: 0, k14: 0, k13: 0, k12: 0, k11: 0, + k10: 0, k9: 0, k8: 0, k7: 0, k6: 0, k5: 0, k4: 0, k3: 0, + k2: 0, k1: 0, + k34: b/c*k42, + k31: k39, + k26: a/c*k42, + k23: k39, + } + +def time_eqs_189x49(): + if len(eqs_189x49()) != 189: + raise ValueError("Length should be equal to 189") + +def time_solve_lin_sys_189x49(): + eqs = eqs_189x49() + sol = solve_lin_sys(eqs, R_49) + if sol != sol_189x49(): + raise ValueError("Values should be equal") + +def time_verify_sol_189x49(): + eqs = eqs_189x49() + sol = sol_189x49() + zeros = [ eq.compose(sol) for eq in eqs ] + assert all(zero == 0 for zero in zeros) + +def time_to_expr_eqs_189x49(): + eqs = eqs_189x49() + assert [ R_49.from_expr(eq.as_expr()) for eq in eqs ] == eqs + +# Benchmark R_8: shows how fast polynomial GCDs are computed. + +F_a5_5, a_11, a_12, a_13, a_14, a_21, a_22, a_23, a_24, a_31, a_32, a_33, a_34, a_41, a_42, a_43, a_44 = field("a_(1:5)(1:5)", ZZ) +R_8, x0, x1, x2, x3, x4, x5, x6, x7 = ring("x:8", F_a5_5) + +def eqs_10x8(): + return [ + (a_33*a_34 + a_33*a_44 + a_43*a_44)*x3 + (a_33*a_34 + a_33*a_44 + a_43*a_44)*x4 + (a_12*a_34 + a_12*a_44 + a_22*a_34 + a_22*a_44)*x5 + (a_12*a_44 + a_22*a_44)*x6 + (a_12*a_33 + a_22*a_33)*x7 - a_12*a_33 - a_12*a_43 - a_22*a_33 - a_22*a_43, + (a_33 + a_34 + a_43 + a_44)*x3 + (a_33 + a_34 + a_43 + a_44)*x4 + (a_12 + a_22 + a_34 + a_44)*x5 + (a_12 + a_22 + a_44)*x6 + (a_12 + a_22 + a_33)*x7 - a_12 - a_22 - a_33 - a_43, + x3 + x4 + x5 + x6 + x7 - 1, + (a_12*a_33*a_34 + a_12*a_33*a_44 + a_12*a_43*a_44 + a_22*a_33*a_34 + a_22*a_33*a_44 + a_22*a_43*a_44)*x0 + (a_22*a_33*a_34 + a_22*a_33*a_44 + a_22*a_43*a_44)*x1 + (a_12*a_33*a_34 + a_12*a_33*a_44 + a_12*a_43*a_44 + a_22*a_33*a_34 + a_22*a_33*a_44 + a_22*a_43*a_44)*x2 + (a_11*a_33*a_34 + a_11*a_33*a_44 + a_11*a_43*a_44 + a_31*a_33*a_34 + a_31*a_33*a_44 + a_31*a_43*a_44)*x3 + (a_11*a_33*a_34 + a_11*a_33*a_44 + a_11*a_43*a_44 + a_21*a_33*a_34 + a_21*a_33*a_44 + a_21*a_43*a_44 + a_31*a_33*a_34 + a_31*a_33*a_44 + a_31*a_43*a_44)*x4 + (a_11*a_12*a_34 + a_11*a_12*a_44 + a_11*a_22*a_34 + a_11*a_22*a_44 + a_12*a_31*a_34 + a_12*a_31*a_44 + a_21*a_22*a_34 + a_21*a_22*a_44 + a_22*a_31*a_34 + a_22*a_31*a_44)*x5 + (a_11*a_12*a_44 + a_11*a_22*a_44 + a_12*a_31*a_44 + a_21*a_22*a_44 + a_22*a_31*a_44)*x6 + (a_11*a_12*a_33 + a_11*a_22*a_33 + a_12*a_31*a_33 + a_21*a_22*a_33 + a_22*a_31*a_33)*x7 - a_11*a_12*a_33 - a_11*a_12*a_43 - a_11*a_22*a_33 - a_11*a_22*a_43 - a_12*a_31*a_33 - a_12*a_31*a_43 - a_21*a_22*a_33 - a_21*a_22*a_43 - a_22*a_31*a_33 - a_22*a_31*a_43, + (a_12*a_33 + a_12*a_34 + a_12*a_43 + a_12*a_44 + a_22*a_33 + a_22*a_34 + a_22*a_43 + a_22*a_44 + a_33*a_34 + a_33*a_44 + a_43*a_44)*x0 + (a_22*a_33 + a_22*a_34 + a_22*a_43 + a_22*a_44 + a_33*a_34 + a_33*a_44 + a_43*a_44)*x1 + (a_12*a_33 + a_12*a_34 + a_12*a_43 + a_12*a_44 + a_22*a_33 + a_22*a_34 + a_22*a_43 + a_22*a_44 + a_33*a_34 + a_33*a_44 + a_43*a_44)*x2 + (a_11*a_33 + a_11*a_34 + a_11*a_43 + a_11*a_44 + a_31*a_33 + a_31*a_34 + a_31*a_43 + a_31*a_44 + a_33*a_34 + a_33*a_44 + a_43*a_44)*x3 + (a_11*a_33 + a_11*a_34 + a_11*a_43 + a_11*a_44 + a_21*a_33 + a_21*a_34 + a_21*a_43 + a_21*a_44 + a_31*a_33 + a_31*a_34 + a_31*a_43 + a_31*a_44 + a_33*a_34 + a_33*a_44 + a_43*a_44)*x4 + (a_11*a_12 + a_11*a_22 + a_11*a_34 + a_11*a_44 + a_12*a_31 + a_12*a_34 + a_12*a_44 + a_21*a_22 + a_21*a_34 + a_21*a_44 + a_22*a_31 + a_22*a_34 + a_22*a_44 + a_31*a_34 + a_31*a_44)*x5 + (a_11*a_12 + a_11*a_22 + a_11*a_44 + a_12*a_31 + a_12*a_44 + a_21*a_22 + a_21*a_44 + a_22*a_31 + a_22*a_44 + a_31*a_44)*x6 + (a_11*a_12 + a_11*a_22 + a_11*a_33 + a_12*a_31 + a_12*a_33 + a_21*a_22 + a_21*a_33 + a_22*a_31 + a_22*a_33 + a_31*a_33)*x7 - a_11*a_12 - a_11*a_22 - a_11*a_33 - a_11*a_43 - a_12*a_31 - a_12*a_33 - a_12*a_43 - a_21*a_22 - a_21*a_33 - a_21*a_43 - a_22*a_31 - a_22*a_33 - a_22*a_43 - a_31*a_33 - a_31*a_43, + (a_12 + a_22 + a_33 + a_34 + a_43 + a_44)*x0 + (a_22 + a_33 + a_34 + a_43 + a_44)*x1 + (a_12 + a_22 + a_33 + a_34 + a_43 + a_44)*x2 + (a_11 + a_31 + a_33 + a_34 + a_43 + a_44)*x3 + (a_11 + a_21 + a_31 + a_33 + a_34 + a_43 + a_44)*x4 + (a_11 + a_12 + a_21 + a_22 + a_31 + a_34 + a_44)*x5 + (a_11 + a_12 + a_21 + a_22 + a_31 + a_44)*x6 + (a_11 + a_12 + a_21 + a_22 + a_31 + a_33)*x7 - a_11 - a_12 - a_21 - a_22 - a_31 - a_33 - a_43, + x0 + x1 + x2 + x3 + x4 + x5 + x6 + x7 - 1, + (a_12*a_34 + a_12*a_44 + a_22*a_34 + a_22*a_44)*x2 + (a_31*a_34 + a_31*a_44)*x3 + (a_31*a_34 + a_31*a_44)*x4 + (a_12*a_31 + a_22*a_31)*x7 - a_12*a_31 - a_22*a_31, + (a_12 + a_22 + a_34 + a_44)*x2 + a_31*x3 + a_31*x4 + a_31*x7 - a_31, + x2, + ] + +def sol_10x8(): + return { + x0: -a_21/a_12*x4, + x1: a_21/a_12*x4, + x2: 0, + x3: -x4, + x5: a_43/a_34, + x6: -a_43/a_34, + x7: 1, + } + +def time_eqs_10x8(): + if len(eqs_10x8()) != 10: + raise ValueError("Value should be equal to 10") + +def time_solve_lin_sys_10x8(): + eqs = eqs_10x8() + sol = solve_lin_sys(eqs, R_8) + if sol != sol_10x8(): + raise ValueError("Values should be equal") + +def time_verify_sol_10x8(): + eqs = eqs_10x8() + sol = sol_10x8() + zeros = [ eq.compose(sol) for eq in eqs ] + if not all(zero == 0 for zero in zeros): + raise ValueError("All values in zero should be 0") + +def time_to_expr_eqs_10x8(): + eqs = eqs_10x8() + assert [ R_8.from_expr(eq.as_expr()) for eq in eqs ] == eqs diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/compatibility.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/compatibility.py new file mode 100644 index 0000000000000000000000000000000000000000..eb239d282a738d1e5611a2249d313ff1d3b7671c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/compatibility.py @@ -0,0 +1,1152 @@ +"""Compatibility interface between dense and sparse polys. """ + +from __future__ import annotations + +from typing import TYPE_CHECKING + +if TYPE_CHECKING: + from sympy.core.expr import Expr + from sympy.polys.domains.domain import Domain + from sympy.polys.orderings import MonomialOrder + from sympy.polys.rings import PolyElement + +from sympy.polys.densearith import dup_add_term +from sympy.polys.densearith import dmp_add_term +from sympy.polys.densearith import dup_sub_term +from sympy.polys.densearith import dmp_sub_term +from sympy.polys.densearith import dup_mul_term +from sympy.polys.densearith import dmp_mul_term +from sympy.polys.densearith import dup_add_ground +from sympy.polys.densearith import dmp_add_ground +from sympy.polys.densearith import dup_sub_ground +from sympy.polys.densearith import dmp_sub_ground +from sympy.polys.densearith import dup_mul_ground +from sympy.polys.densearith import dmp_mul_ground +from sympy.polys.densearith import dup_quo_ground +from sympy.polys.densearith import dmp_quo_ground +from sympy.polys.densearith import dup_exquo_ground +from sympy.polys.densearith import dmp_exquo_ground +from sympy.polys.densearith import dup_lshift +from sympy.polys.densearith import dup_rshift +from sympy.polys.densearith import dup_abs +from sympy.polys.densearith import dmp_abs +from sympy.polys.densearith import dup_neg +from sympy.polys.densearith import dmp_neg +from sympy.polys.densearith import dup_add +from sympy.polys.densearith import dmp_add +from sympy.polys.densearith import dup_sub +from sympy.polys.densearith import dmp_sub +from sympy.polys.densearith import dup_add_mul +from sympy.polys.densearith import dmp_add_mul +from sympy.polys.densearith import dup_sub_mul +from sympy.polys.densearith import dmp_sub_mul +from sympy.polys.densearith import dup_mul +from sympy.polys.densearith import dmp_mul +from sympy.polys.densearith import dup_sqr +from sympy.polys.densearith import dmp_sqr +from sympy.polys.densearith import dup_pow +from sympy.polys.densearith import dmp_pow +from sympy.polys.densearith import dup_pdiv +from sympy.polys.densearith import dup_prem +from sympy.polys.densearith import dup_pquo +from sympy.polys.densearith import dup_pexquo +from sympy.polys.densearith import dmp_pdiv +from sympy.polys.densearith import dmp_prem +from sympy.polys.densearith import dmp_pquo +from sympy.polys.densearith import dmp_pexquo +from sympy.polys.densearith import dup_rr_div +from sympy.polys.densearith import dmp_rr_div +from sympy.polys.densearith import dup_ff_div +from sympy.polys.densearith import dmp_ff_div +from sympy.polys.densearith import dup_div +from sympy.polys.densearith import dup_rem +from sympy.polys.densearith import dup_quo +from sympy.polys.densearith import dup_exquo +from sympy.polys.densearith import dmp_div +from sympy.polys.densearith import dmp_rem +from sympy.polys.densearith import dmp_quo +from sympy.polys.densearith import dmp_exquo +from sympy.polys.densearith import dup_max_norm +from sympy.polys.densearith import dmp_max_norm +from sympy.polys.densearith import dup_l1_norm +from sympy.polys.densearith import dmp_l1_norm +from sympy.polys.densearith import dup_l2_norm_squared +from sympy.polys.densearith import dmp_l2_norm_squared +from sympy.polys.densearith import dup_expand +from sympy.polys.densearith import dmp_expand +from sympy.polys.densebasic import dup_LC +from sympy.polys.densebasic import dmp_LC +from sympy.polys.densebasic import dup_TC +from sympy.polys.densebasic import dmp_TC +from sympy.polys.densebasic import dmp_ground_LC +from sympy.polys.densebasic import dmp_ground_TC +from sympy.polys.densebasic import dup_degree +from sympy.polys.densebasic import dmp_degree +from sympy.polys.densebasic import dmp_degree_in +from sympy.polys.densebasic import dmp_to_dict +from sympy.polys.densetools import dup_integrate +from sympy.polys.densetools import dmp_integrate +from sympy.polys.densetools import dmp_integrate_in +from sympy.polys.densetools import dup_diff +from sympy.polys.densetools import dmp_diff +from sympy.polys.densetools import dmp_diff_in +from sympy.polys.densetools import dup_eval +from sympy.polys.densetools import dmp_eval +from sympy.polys.densetools import dmp_eval_in +from sympy.polys.densetools import dmp_eval_tail +from sympy.polys.densetools import dmp_diff_eval_in +from sympy.polys.densetools import dup_trunc +from sympy.polys.densetools import dmp_trunc +from sympy.polys.densetools import dmp_ground_trunc +from sympy.polys.densetools import dup_monic +from sympy.polys.densetools import dmp_ground_monic +from sympy.polys.densetools import dup_content +from sympy.polys.densetools import dmp_ground_content +from sympy.polys.densetools import dup_primitive +from sympy.polys.densetools import dmp_ground_primitive +from sympy.polys.densetools import dup_extract +from sympy.polys.densetools import dmp_ground_extract +from sympy.polys.densetools import dup_real_imag +from sympy.polys.densetools import dup_mirror +from sympy.polys.densetools import dup_scale +from sympy.polys.densetools import dup_shift +from sympy.polys.densetools import dmp_shift +from sympy.polys.densetools import dup_transform +from sympy.polys.densetools import dup_compose +from sympy.polys.densetools import dmp_compose +from sympy.polys.densetools import dup_decompose +from sympy.polys.densetools import dmp_lift +from sympy.polys.densetools import dup_sign_variations +from sympy.polys.densetools import dup_clear_denoms +from sympy.polys.densetools import dmp_clear_denoms +from sympy.polys.densetools import dup_revert +from sympy.polys.euclidtools import dup_half_gcdex +from sympy.polys.euclidtools import dmp_half_gcdex +from sympy.polys.euclidtools import dup_gcdex +from sympy.polys.euclidtools import dmp_gcdex +from sympy.polys.euclidtools import dup_invert +from sympy.polys.euclidtools import dmp_invert +from sympy.polys.euclidtools import dup_euclidean_prs +from sympy.polys.euclidtools import dmp_euclidean_prs +from sympy.polys.euclidtools import dup_primitive_prs +from sympy.polys.euclidtools import dmp_primitive_prs +from sympy.polys.euclidtools import dup_inner_subresultants +from sympy.polys.euclidtools import dup_subresultants +from sympy.polys.euclidtools import dup_prs_resultant +from sympy.polys.euclidtools import dup_resultant +from sympy.polys.euclidtools import dmp_inner_subresultants +from sympy.polys.euclidtools import dmp_subresultants +from sympy.polys.euclidtools import dmp_prs_resultant +from sympy.polys.euclidtools import dmp_zz_modular_resultant +from sympy.polys.euclidtools import dmp_zz_collins_resultant +from sympy.polys.euclidtools import dmp_qq_collins_resultant +from sympy.polys.euclidtools import dmp_resultant +from sympy.polys.euclidtools import dup_discriminant +from sympy.polys.euclidtools import dmp_discriminant +from sympy.polys.euclidtools import dup_rr_prs_gcd +from sympy.polys.euclidtools import dup_ff_prs_gcd +from sympy.polys.euclidtools import dmp_rr_prs_gcd +from sympy.polys.euclidtools import dmp_ff_prs_gcd +from sympy.polys.euclidtools import dup_zz_heu_gcd +from sympy.polys.euclidtools import dmp_zz_heu_gcd +from sympy.polys.euclidtools import dup_qq_heu_gcd +from sympy.polys.euclidtools import dmp_qq_heu_gcd +from sympy.polys.euclidtools import dup_inner_gcd +from sympy.polys.euclidtools import dmp_inner_gcd +from sympy.polys.euclidtools import dup_gcd +from sympy.polys.euclidtools import dmp_gcd +from sympy.polys.euclidtools import dup_rr_lcm +from sympy.polys.euclidtools import dup_ff_lcm +from sympy.polys.euclidtools import dup_lcm +from sympy.polys.euclidtools import dmp_rr_lcm +from sympy.polys.euclidtools import dmp_ff_lcm +from sympy.polys.euclidtools import dmp_lcm +from sympy.polys.euclidtools import dmp_content +from sympy.polys.euclidtools import dmp_primitive +from sympy.polys.euclidtools import dup_cancel +from sympy.polys.euclidtools import dmp_cancel +from sympy.polys.factortools import dup_trial_division +from sympy.polys.factortools import dmp_trial_division +from sympy.polys.factortools import dup_zz_mignotte_bound +from sympy.polys.factortools import dmp_zz_mignotte_bound +from sympy.polys.factortools import dup_zz_hensel_step +from sympy.polys.factortools import dup_zz_hensel_lift +from sympy.polys.factortools import dup_zz_zassenhaus +from sympy.polys.factortools import dup_zz_irreducible_p +from sympy.polys.factortools import dup_cyclotomic_p +from sympy.polys.factortools import dup_zz_cyclotomic_poly +from sympy.polys.factortools import dup_zz_cyclotomic_factor +from sympy.polys.factortools import dup_zz_factor_sqf +from sympy.polys.factortools import dup_zz_factor +from sympy.polys.factortools import dmp_zz_wang_non_divisors +from sympy.polys.factortools import dmp_zz_wang_lead_coeffs +from sympy.polys.factortools import dup_zz_diophantine +from sympy.polys.factortools import dmp_zz_diophantine +from sympy.polys.factortools import dmp_zz_wang_hensel_lifting +from sympy.polys.factortools import dmp_zz_wang +from sympy.polys.factortools import dmp_zz_factor +from sympy.polys.factortools import dup_qq_i_factor +from sympy.polys.factortools import dup_zz_i_factor +from sympy.polys.factortools import dmp_qq_i_factor +from sympy.polys.factortools import dmp_zz_i_factor +from sympy.polys.factortools import dup_ext_factor +from sympy.polys.factortools import dmp_ext_factor +from sympy.polys.factortools import dup_gf_factor +from sympy.polys.factortools import dmp_gf_factor +from sympy.polys.factortools import dup_factor_list +from sympy.polys.factortools import dup_factor_list_include +from sympy.polys.factortools import dmp_factor_list +from sympy.polys.factortools import dmp_factor_list_include +from sympy.polys.factortools import dup_irreducible_p +from sympy.polys.factortools import dmp_irreducible_p +from sympy.polys.rootisolation import dup_sturm +from sympy.polys.rootisolation import dup_root_upper_bound +from sympy.polys.rootisolation import dup_root_lower_bound +from sympy.polys.rootisolation import dup_step_refine_real_root +from sympy.polys.rootisolation import dup_inner_refine_real_root +from sympy.polys.rootisolation import dup_outer_refine_real_root +from sympy.polys.rootisolation import dup_refine_real_root +from sympy.polys.rootisolation import dup_inner_isolate_real_roots +from sympy.polys.rootisolation import dup_inner_isolate_positive_roots +from sympy.polys.rootisolation import dup_inner_isolate_negative_roots +from sympy.polys.rootisolation import dup_isolate_real_roots_sqf +from sympy.polys.rootisolation import dup_isolate_real_roots +from sympy.polys.rootisolation import dup_isolate_real_roots_list +from sympy.polys.rootisolation import dup_count_real_roots +from sympy.polys.rootisolation import dup_count_complex_roots +from sympy.polys.rootisolation import dup_isolate_complex_roots_sqf +from sympy.polys.rootisolation import dup_isolate_all_roots_sqf +from sympy.polys.rootisolation import dup_isolate_all_roots + +from sympy.polys.sqfreetools import ( + dup_sqf_p, dmp_sqf_p, dmp_norm, dup_sqf_norm, dmp_sqf_norm, + dup_gf_sqf_part, dmp_gf_sqf_part, dup_sqf_part, dmp_sqf_part, + dup_gf_sqf_list, dmp_gf_sqf_list, dup_sqf_list, dup_sqf_list_include, + dmp_sqf_list, dmp_sqf_list_include, dup_gff_list, dmp_gff_list) + +from sympy.polys.galoistools import ( + gf_degree, gf_LC, gf_TC, gf_strip, gf_from_dict, + gf_to_dict, gf_from_int_poly, gf_to_int_poly, gf_neg, gf_add_ground, gf_sub_ground, + gf_mul_ground, gf_quo_ground, gf_add, gf_sub, gf_mul, gf_sqr, gf_add_mul, gf_sub_mul, + gf_expand, gf_div, gf_rem, gf_quo, gf_exquo, gf_lshift, gf_rshift, gf_pow, gf_pow_mod, + gf_gcd, gf_lcm, gf_cofactors, gf_gcdex, gf_monic, gf_diff, gf_eval, gf_multi_eval, + gf_compose, gf_compose_mod, gf_trace_map, gf_random, gf_irreducible, gf_irred_p_ben_or, + gf_irred_p_rabin, gf_irreducible_p, gf_sqf_p, gf_sqf_part, gf_Qmatrix, + gf_berlekamp, gf_ddf_zassenhaus, gf_edf_zassenhaus, gf_ddf_shoup, gf_edf_shoup, + gf_zassenhaus, gf_shoup, gf_factor_sqf, gf_factor) + +from sympy.utilities import public + +@public +class IPolys: + + gens: tuple[PolyElement, ...] + symbols: tuple[Expr, ...] + ngens: int + domain: Domain + order: MonomialOrder + + def drop(self, gen): + pass + + def clone(self, symbols=None, domain=None, order=None): + pass + + def to_ground(self): + pass + + def ground_new(self, element): + pass + + def domain_new(self, element): + pass + + def from_dict(self, d): + pass + + def wrap(self, element): + from sympy.polys.rings import PolyElement + if isinstance(element, PolyElement): + if element.ring == self: + return element + else: + raise NotImplementedError("domain conversions") + else: + return self.ground_new(element) + + def to_dense(self, element): + return self.wrap(element).to_dense() + + def from_dense(self, element): + return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain)) + + def dup_add_term(self, f, c, i): + return self.from_dense(dup_add_term(self.to_dense(f), c, i, self.domain)) + def dmp_add_term(self, f, c, i): + return self.from_dense(dmp_add_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain)) + def dup_sub_term(self, f, c, i): + return self.from_dense(dup_sub_term(self.to_dense(f), c, i, self.domain)) + def dmp_sub_term(self, f, c, i): + return self.from_dense(dmp_sub_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain)) + def dup_mul_term(self, f, c, i): + return self.from_dense(dup_mul_term(self.to_dense(f), c, i, self.domain)) + def dmp_mul_term(self, f, c, i): + return self.from_dense(dmp_mul_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain)) + + def dup_add_ground(self, f, c): + return self.from_dense(dup_add_ground(self.to_dense(f), c, self.domain)) + def dmp_add_ground(self, f, c): + return self.from_dense(dmp_add_ground(self.to_dense(f), c, self.ngens-1, self.domain)) + def dup_sub_ground(self, f, c): + return self.from_dense(dup_sub_ground(self.to_dense(f), c, self.domain)) + def dmp_sub_ground(self, f, c): + return self.from_dense(dmp_sub_ground(self.to_dense(f), c, self.ngens-1, self.domain)) + def dup_mul_ground(self, f, c): + return self.from_dense(dup_mul_ground(self.to_dense(f), c, self.domain)) + def dmp_mul_ground(self, f, c): + return self.from_dense(dmp_mul_ground(self.to_dense(f), c, self.ngens-1, self.domain)) + def dup_quo_ground(self, f, c): + return self.from_dense(dup_quo_ground(self.to_dense(f), c, self.domain)) + def dmp_quo_ground(self, f, c): + return self.from_dense(dmp_quo_ground(self.to_dense(f), c, self.ngens-1, self.domain)) + def dup_exquo_ground(self, f, c): + return self.from_dense(dup_exquo_ground(self.to_dense(f), c, self.domain)) + def dmp_exquo_ground(self, f, c): + return self.from_dense(dmp_exquo_ground(self.to_dense(f), c, self.ngens-1, self.domain)) + + def dup_lshift(self, f, n): + return self.from_dense(dup_lshift(self.to_dense(f), n, self.domain)) + def dup_rshift(self, f, n): + return self.from_dense(dup_rshift(self.to_dense(f), n, self.domain)) + + def dup_abs(self, f): + return self.from_dense(dup_abs(self.to_dense(f), self.domain)) + def dmp_abs(self, f): + return self.from_dense(dmp_abs(self.to_dense(f), self.ngens-1, self.domain)) + + def dup_neg(self, f): + return self.from_dense(dup_neg(self.to_dense(f), self.domain)) + def dmp_neg(self, f): + return self.from_dense(dmp_neg(self.to_dense(f), self.ngens-1, self.domain)) + + def dup_add(self, f, g): + return self.from_dense(dup_add(self.to_dense(f), self.to_dense(g), self.domain)) + def dmp_add(self, f, g): + return self.from_dense(dmp_add(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_sub(self, f, g): + return self.from_dense(dup_sub(self.to_dense(f), self.to_dense(g), self.domain)) + def dmp_sub(self, f, g): + return self.from_dense(dmp_sub(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_add_mul(self, f, g, h): + return self.from_dense(dup_add_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.domain)) + def dmp_add_mul(self, f, g, h): + return self.from_dense(dmp_add_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.ngens-1, self.domain)) + def dup_sub_mul(self, f, g, h): + return self.from_dense(dup_sub_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.domain)) + def dmp_sub_mul(self, f, g, h): + return self.from_dense(dmp_sub_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.ngens-1, self.domain)) + + def dup_mul(self, f, g): + return self.from_dense(dup_mul(self.to_dense(f), self.to_dense(g), self.domain)) + def dmp_mul(self, f, g): + return self.from_dense(dmp_mul(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_sqr(self, f): + return self.from_dense(dup_sqr(self.to_dense(f), self.domain)) + def dmp_sqr(self, f): + return self.from_dense(dmp_sqr(self.to_dense(f), self.ngens-1, self.domain)) + def dup_pow(self, f, n): + return self.from_dense(dup_pow(self.to_dense(f), n, self.domain)) + def dmp_pow(self, f, n): + return self.from_dense(dmp_pow(self.to_dense(f), n, self.ngens-1, self.domain)) + + def dup_pdiv(self, f, g): + q, r = dup_pdiv(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dup_prem(self, f, g): + return self.from_dense(dup_prem(self.to_dense(f), self.to_dense(g), self.domain)) + def dup_pquo(self, f, g): + return self.from_dense(dup_pquo(self.to_dense(f), self.to_dense(g), self.domain)) + def dup_pexquo(self, f, g): + return self.from_dense(dup_pexquo(self.to_dense(f), self.to_dense(g), self.domain)) + + def dmp_pdiv(self, f, g): + q, r = dmp_pdiv(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dmp_prem(self, f, g): + return self.from_dense(dmp_prem(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + def dmp_pquo(self, f, g): + return self.from_dense(dmp_pquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + def dmp_pexquo(self, f, g): + return self.from_dense(dmp_pexquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_rr_div(self, f, g): + q, r = dup_rr_div(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dmp_rr_div(self, f, g): + q, r = dmp_rr_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dup_ff_div(self, f, g): + q, r = dup_ff_div(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dmp_ff_div(self, f, g): + q, r = dmp_ff_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(q), self.from_dense(r)) + + def dup_div(self, f, g): + q, r = dup_div(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dup_rem(self, f, g): + return self.from_dense(dup_rem(self.to_dense(f), self.to_dense(g), self.domain)) + def dup_quo(self, f, g): + return self.from_dense(dup_quo(self.to_dense(f), self.to_dense(g), self.domain)) + def dup_exquo(self, f, g): + return self.from_dense(dup_exquo(self.to_dense(f), self.to_dense(g), self.domain)) + + def dmp_div(self, f, g): + q, r = dmp_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(q), self.from_dense(r)) + def dmp_rem(self, f, g): + return self.from_dense(dmp_rem(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + def dmp_quo(self, f, g): + return self.from_dense(dmp_quo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + def dmp_exquo(self, f, g): + return self.from_dense(dmp_exquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_max_norm(self, f): + return dup_max_norm(self.to_dense(f), self.domain) + def dmp_max_norm(self, f): + return dmp_max_norm(self.to_dense(f), self.ngens-1, self.domain) + + def dup_l1_norm(self, f): + return dup_l1_norm(self.to_dense(f), self.domain) + def dmp_l1_norm(self, f): + return dmp_l1_norm(self.to_dense(f), self.ngens-1, self.domain) + + def dup_l2_norm_squared(self, f): + return dup_l2_norm_squared(self.to_dense(f), self.domain) + def dmp_l2_norm_squared(self, f): + return dmp_l2_norm_squared(self.to_dense(f), self.ngens-1, self.domain) + + def dup_expand(self, polys): + return self.from_dense(dup_expand(list(map(self.to_dense, polys)), self.domain)) + def dmp_expand(self, polys): + return self.from_dense(dmp_expand(list(map(self.to_dense, polys)), self.ngens-1, self.domain)) + + def dup_LC(self, f): + return dup_LC(self.to_dense(f), self.domain) + def dmp_LC(self, f): + LC = dmp_LC(self.to_dense(f), self.domain) + if isinstance(LC, list): + return self[1:].from_dense(LC) + else: + return LC + def dup_TC(self, f): + return dup_TC(self.to_dense(f), self.domain) + def dmp_TC(self, f): + TC = dmp_TC(self.to_dense(f), self.domain) + if isinstance(TC, list): + return self[1:].from_dense(TC) + else: + return TC + + def dmp_ground_LC(self, f): + return dmp_ground_LC(self.to_dense(f), self.ngens-1, self.domain) + def dmp_ground_TC(self, f): + return dmp_ground_TC(self.to_dense(f), self.ngens-1, self.domain) + + def dup_degree(self, f): + return dup_degree(self.to_dense(f)) + def dmp_degree(self, f): + return dmp_degree(self.to_dense(f), self.ngens-1) + def dmp_degree_in(self, f, j): + return dmp_degree_in(self.to_dense(f), j, self.ngens-1) + def dup_integrate(self, f, m): + return self.from_dense(dup_integrate(self.to_dense(f), m, self.domain)) + def dmp_integrate(self, f, m): + return self.from_dense(dmp_integrate(self.to_dense(f), m, self.ngens-1, self.domain)) + + def dup_diff(self, f, m): + return self.from_dense(dup_diff(self.to_dense(f), m, self.domain)) + def dmp_diff(self, f, m): + return self.from_dense(dmp_diff(self.to_dense(f), m, self.ngens-1, self.domain)) + + def dmp_diff_in(self, f, m, j): + return self.from_dense(dmp_diff_in(self.to_dense(f), m, j, self.ngens-1, self.domain)) + def dmp_integrate_in(self, f, m, j): + return self.from_dense(dmp_integrate_in(self.to_dense(f), m, j, self.ngens-1, self.domain)) + + def dup_eval(self, f, a): + return dup_eval(self.to_dense(f), a, self.domain) + def dmp_eval(self, f, a): + result = dmp_eval(self.to_dense(f), a, self.ngens-1, self.domain) + return self[1:].from_dense(result) + + def dmp_eval_in(self, f, a, j): + result = dmp_eval_in(self.to_dense(f), a, j, self.ngens-1, self.domain) + return self.drop(j).from_dense(result) + def dmp_diff_eval_in(self, f, m, a, j): + result = dmp_diff_eval_in(self.to_dense(f), m, a, j, self.ngens-1, self.domain) + return self.drop(j).from_dense(result) + + def dmp_eval_tail(self, f, A): + result = dmp_eval_tail(self.to_dense(f), A, self.ngens-1, self.domain) + if isinstance(result, list): + return self[:-len(A)].from_dense(result) + else: + return result + + def dup_trunc(self, f, p): + return self.from_dense(dup_trunc(self.to_dense(f), p, self.domain)) + def dmp_trunc(self, f, g): + return self.from_dense(dmp_trunc(self.to_dense(f), self[1:].to_dense(g), self.ngens-1, self.domain)) + def dmp_ground_trunc(self, f, p): + return self.from_dense(dmp_ground_trunc(self.to_dense(f), p, self.ngens-1, self.domain)) + + def dup_monic(self, f): + return self.from_dense(dup_monic(self.to_dense(f), self.domain)) + def dmp_ground_monic(self, f): + return self.from_dense(dmp_ground_monic(self.to_dense(f), self.ngens-1, self.domain)) + + def dup_extract(self, f, g): + c, F, G = dup_extract(self.to_dense(f), self.to_dense(g), self.domain) + return (c, self.from_dense(F), self.from_dense(G)) + def dmp_ground_extract(self, f, g): + c, F, G = dmp_ground_extract(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (c, self.from_dense(F), self.from_dense(G)) + + def dup_real_imag(self, f): + p, q = dup_real_imag(self.wrap(f).drop(1).to_dense(), self.domain) + return (self.from_dense(p), self.from_dense(q)) + + def dup_mirror(self, f): + return self.from_dense(dup_mirror(self.to_dense(f), self.domain)) + def dup_scale(self, f, a): + return self.from_dense(dup_scale(self.to_dense(f), a, self.domain)) + def dup_shift(self, f, a): + return self.from_dense(dup_shift(self.to_dense(f), a, self.domain)) + def dmp_shift(self, f, a): + return self.from_dense(dmp_shift(self.to_dense(f), a, self.ngens-1, self.domain)) + def dup_transform(self, f, p, q): + return self.from_dense(dup_transform(self.to_dense(f), self.to_dense(p), self.to_dense(q), self.domain)) + + def dup_compose(self, f, g): + return self.from_dense(dup_compose(self.to_dense(f), self.to_dense(g), self.domain)) + def dmp_compose(self, f, g): + return self.from_dense(dmp_compose(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_decompose(self, f): + components = dup_decompose(self.to_dense(f), self.domain) + return list(map(self.from_dense, components)) + + def dmp_lift(self, f): + result = dmp_lift(self.to_dense(f), self.ngens-1, self.domain) + return self.to_ground().from_dense(result) + + def dup_sign_variations(self, f): + return dup_sign_variations(self.to_dense(f), self.domain) + + def dup_clear_denoms(self, f, convert=False): + c, F = dup_clear_denoms(self.to_dense(f), self.domain, convert=convert) + if convert: + ring = self.clone(domain=self.domain.get_ring()) + else: + ring = self + return (c, ring.from_dense(F)) + def dmp_clear_denoms(self, f, convert=False): + c, F = dmp_clear_denoms(self.to_dense(f), self.ngens-1, self.domain, convert=convert) + if convert: + ring = self.clone(domain=self.domain.get_ring()) + else: + ring = self + return (c, ring.from_dense(F)) + + def dup_revert(self, f, n): + return self.from_dense(dup_revert(self.to_dense(f), n, self.domain)) + + def dup_half_gcdex(self, f, g): + s, h = dup_half_gcdex(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(s), self.from_dense(h)) + def dmp_half_gcdex(self, f, g): + s, h = dmp_half_gcdex(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(s), self.from_dense(h)) + def dup_gcdex(self, f, g): + s, t, h = dup_gcdex(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(s), self.from_dense(t), self.from_dense(h)) + def dmp_gcdex(self, f, g): + s, t, h = dmp_gcdex(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(s), self.from_dense(t), self.from_dense(h)) + + def dup_invert(self, f, g): + return self.from_dense(dup_invert(self.to_dense(f), self.to_dense(g), self.domain)) + def dmp_invert(self, f, g): + return self.from_dense(dmp_invert(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)) + + def dup_euclidean_prs(self, f, g): + prs = dup_euclidean_prs(self.to_dense(f), self.to_dense(g), self.domain) + return list(map(self.from_dense, prs)) + def dmp_euclidean_prs(self, f, g): + prs = dmp_euclidean_prs(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return list(map(self.from_dense, prs)) + def dup_primitive_prs(self, f, g): + prs = dup_primitive_prs(self.to_dense(f), self.to_dense(g), self.domain) + return list(map(self.from_dense, prs)) + def dmp_primitive_prs(self, f, g): + prs = dmp_primitive_prs(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return list(map(self.from_dense, prs)) + + def dup_inner_subresultants(self, f, g): + prs, sres = dup_inner_subresultants(self.to_dense(f), self.to_dense(g), self.domain) + return (list(map(self.from_dense, prs)), sres) + def dmp_inner_subresultants(self, f, g): + prs, sres = dmp_inner_subresultants(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (list(map(self.from_dense, prs)), sres) + + def dup_subresultants(self, f, g): + prs = dup_subresultants(self.to_dense(f), self.to_dense(g), self.domain) + return list(map(self.from_dense, prs)) + def dmp_subresultants(self, f, g): + prs = dmp_subresultants(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return list(map(self.from_dense, prs)) + + def dup_prs_resultant(self, f, g): + res, prs = dup_prs_resultant(self.to_dense(f), self.to_dense(g), self.domain) + return (res, list(map(self.from_dense, prs))) + def dmp_prs_resultant(self, f, g): + res, prs = dmp_prs_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self[1:].from_dense(res), list(map(self.from_dense, prs))) + + def dmp_zz_modular_resultant(self, f, g, p): + res = dmp_zz_modular_resultant(self.to_dense(f), self.to_dense(g), self.domain_new(p), self.ngens-1, self.domain) + return self[1:].from_dense(res) + def dmp_zz_collins_resultant(self, f, g): + res = dmp_zz_collins_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self[1:].from_dense(res) + def dmp_qq_collins_resultant(self, f, g): + res = dmp_qq_collins_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self[1:].from_dense(res) + + def dup_resultant(self, f, g): #, includePRS=False): + return dup_resultant(self.to_dense(f), self.to_dense(g), self.domain) #, includePRS=includePRS) + def dmp_resultant(self, f, g): #, includePRS=False): + res = dmp_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) #, includePRS=includePRS) + if isinstance(res, list): + return self[1:].from_dense(res) + else: + return res + + def dup_discriminant(self, f): + return dup_discriminant(self.to_dense(f), self.domain) + def dmp_discriminant(self, f): + disc = dmp_discriminant(self.to_dense(f), self.ngens-1, self.domain) + if isinstance(disc, list): + return self[1:].from_dense(disc) + else: + return disc + + def dup_rr_prs_gcd(self, f, g): + H, F, G = dup_rr_prs_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dup_ff_prs_gcd(self, f, g): + H, F, G = dup_ff_prs_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dmp_rr_prs_gcd(self, f, g): + H, F, G = dmp_rr_prs_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dmp_ff_prs_gcd(self, f, g): + H, F, G = dmp_ff_prs_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dup_zz_heu_gcd(self, f, g): + H, F, G = dup_zz_heu_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dmp_zz_heu_gcd(self, f, g): + H, F, G = dmp_zz_heu_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dup_qq_heu_gcd(self, f, g): + H, F, G = dup_qq_heu_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dmp_qq_heu_gcd(self, f, g): + H, F, G = dmp_qq_heu_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dup_inner_gcd(self, f, g): + H, F, G = dup_inner_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dmp_inner_gcd(self, f, g): + H, F, G = dmp_inner_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return (self.from_dense(H), self.from_dense(F), self.from_dense(G)) + def dup_gcd(self, f, g): + H = dup_gcd(self.to_dense(f), self.to_dense(g), self.domain) + return self.from_dense(H) + def dmp_gcd(self, f, g): + H = dmp_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self.from_dense(H) + def dup_rr_lcm(self, f, g): + H = dup_rr_lcm(self.to_dense(f), self.to_dense(g), self.domain) + return self.from_dense(H) + def dup_ff_lcm(self, f, g): + H = dup_ff_lcm(self.to_dense(f), self.to_dense(g), self.domain) + return self.from_dense(H) + def dup_lcm(self, f, g): + H = dup_lcm(self.to_dense(f), self.to_dense(g), self.domain) + return self.from_dense(H) + def dmp_rr_lcm(self, f, g): + H = dmp_rr_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self.from_dense(H) + def dmp_ff_lcm(self, f, g): + H = dmp_ff_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self.from_dense(H) + def dmp_lcm(self, f, g): + H = dmp_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) + return self.from_dense(H) + + def dup_content(self, f): + cont = dup_content(self.to_dense(f), self.domain) + return cont + def dup_primitive(self, f): + cont, prim = dup_primitive(self.to_dense(f), self.domain) + return cont, self.from_dense(prim) + + def dmp_content(self, f): + cont = dmp_content(self.to_dense(f), self.ngens-1, self.domain) + if isinstance(cont, list): + return self[1:].from_dense(cont) + else: + return cont + def dmp_primitive(self, f): + cont, prim = dmp_primitive(self.to_dense(f), self.ngens-1, self.domain) + if isinstance(cont, list): + return (self[1:].from_dense(cont), self.from_dense(prim)) + else: + return (cont, self.from_dense(prim)) + + def dmp_ground_content(self, f): + cont = dmp_ground_content(self.to_dense(f), self.ngens-1, self.domain) + return cont + def dmp_ground_primitive(self, f): + cont, prim = dmp_ground_primitive(self.to_dense(f), self.ngens-1, self.domain) + return (cont, self.from_dense(prim)) + + def dup_cancel(self, f, g, include=True): + result = dup_cancel(self.to_dense(f), self.to_dense(g), self.domain, include=include) + if not include: + cf, cg, F, G = result + return (cf, cg, self.from_dense(F), self.from_dense(G)) + else: + F, G = result + return (self.from_dense(F), self.from_dense(G)) + def dmp_cancel(self, f, g, include=True): + result = dmp_cancel(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain, include=include) + if not include: + cf, cg, F, G = result + return (cf, cg, self.from_dense(F), self.from_dense(G)) + else: + F, G = result + return (self.from_dense(F), self.from_dense(G)) + + def dup_trial_division(self, f, factors): + factors = dup_trial_division(self.to_dense(f), list(map(self.to_dense, factors)), self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + def dmp_trial_division(self, f, factors): + factors = dmp_trial_division(self.to_dense(f), list(map(self.to_dense, factors)), self.ngens-1, self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dup_zz_mignotte_bound(self, f): + return dup_zz_mignotte_bound(self.to_dense(f), self.domain) + def dmp_zz_mignotte_bound(self, f): + return dmp_zz_mignotte_bound(self.to_dense(f), self.ngens-1, self.domain) + + def dup_zz_hensel_step(self, m, f, g, h, s, t): + D = self.to_dense + G, H, S, T = dup_zz_hensel_step(m, D(f), D(g), D(h), D(s), D(t), self.domain) + return (self.from_dense(G), self.from_dense(H), self.from_dense(S), self.from_dense(T)) + def dup_zz_hensel_lift(self, p, f, f_list, l): + D = self.to_dense + polys = dup_zz_hensel_lift(p, D(f), list(map(D, f_list)), l, self.domain) + return list(map(self.from_dense, polys)) + + def dup_zz_zassenhaus(self, f): + factors = dup_zz_zassenhaus(self.to_dense(f), self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dup_zz_irreducible_p(self, f): + return dup_zz_irreducible_p(self.to_dense(f), self.domain) + def dup_cyclotomic_p(self, f, irreducible=False): + return dup_cyclotomic_p(self.to_dense(f), self.domain, irreducible=irreducible) + def dup_zz_cyclotomic_poly(self, n): + F = dup_zz_cyclotomic_poly(n, self.domain) + return self.from_dense(F) + def dup_zz_cyclotomic_factor(self, f): + result = dup_zz_cyclotomic_factor(self.to_dense(f), self.domain) + if result is None: + return result + else: + return list(map(self.from_dense, result)) + + # E: List[ZZ], cs: ZZ, ct: ZZ + def dmp_zz_wang_non_divisors(self, E, cs, ct): + return dmp_zz_wang_non_divisors(E, cs, ct, self.domain) + + # f: Poly, T: List[(Poly, int)], ct: ZZ, A: List[ZZ] + #def dmp_zz_wang_test_points(f, T, ct, A): + # dmp_zz_wang_test_points(self.to_dense(f), T, ct, A, self.ngens-1, self.domain) + + # f: Poly, T: List[(Poly, int)], cs: ZZ, E: List[ZZ], H: List[Poly], A: List[ZZ] + def dmp_zz_wang_lead_coeffs(self, f, T, cs, E, H, A): + mv = self[1:] + T = [ (mv.to_dense(t), k) for t, k in T ] + uv = self[:1] + H = list(map(uv.to_dense, H)) + f, HH, CC = dmp_zz_wang_lead_coeffs(self.to_dense(f), T, cs, E, H, A, self.ngens-1, self.domain) + return self.from_dense(f), list(map(uv.from_dense, HH)), list(map(mv.from_dense, CC)) + + # f: List[Poly], m: int, p: ZZ + def dup_zz_diophantine(self, F, m, p): + result = dup_zz_diophantine(list(map(self.to_dense, F)), m, p, self.domain) + return list(map(self.from_dense, result)) + + # f: List[Poly], c: List[Poly], A: List[ZZ], d: int, p: ZZ + def dmp_zz_diophantine(self, F, c, A, d, p): + result = dmp_zz_diophantine(list(map(self.to_dense, F)), self.to_dense(c), A, d, p, self.ngens-1, self.domain) + return list(map(self.from_dense, result)) + + # f: Poly, H: List[Poly], LC: List[Poly], A: List[ZZ], p: ZZ + def dmp_zz_wang_hensel_lifting(self, f, H, LC, A, p): + uv = self[:1] + mv = self[1:] + H = list(map(uv.to_dense, H)) + LC = list(map(mv.to_dense, LC)) + result = dmp_zz_wang_hensel_lifting(self.to_dense(f), H, LC, A, p, self.ngens-1, self.domain) + return list(map(self.from_dense, result)) + + def dmp_zz_wang(self, f, mod=None, seed=None): + factors = dmp_zz_wang(self.to_dense(f), self.ngens-1, self.domain, mod=mod, seed=seed) + return [ self.from_dense(g) for g in factors ] + + def dup_zz_factor_sqf(self, f): + coeff, factors = dup_zz_factor_sqf(self.to_dense(f), self.domain) + return (coeff, [ self.from_dense(g) for g in factors ]) + + def dup_zz_factor(self, f): + coeff, factors = dup_zz_factor(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_zz_factor(self, f): + coeff, factors = dmp_zz_factor(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_qq_i_factor(self, f): + coeff, factors = dup_qq_i_factor(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_qq_i_factor(self, f): + coeff, factors = dmp_qq_i_factor(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_zz_i_factor(self, f): + coeff, factors = dup_zz_i_factor(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_zz_i_factor(self, f): + coeff, factors = dmp_zz_i_factor(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_ext_factor(self, f): + coeff, factors = dup_ext_factor(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_ext_factor(self, f): + coeff, factors = dmp_ext_factor(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_gf_factor(self, f): + coeff, factors = dup_gf_factor(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_gf_factor(self, f): + coeff, factors = dmp_gf_factor(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_factor_list(self, f): + coeff, factors = dup_factor_list(self.to_dense(f), self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dup_factor_list_include(self, f): + factors = dup_factor_list_include(self.to_dense(f), self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dmp_factor_list(self, f): + coeff, factors = dmp_factor_list(self.to_dense(f), self.ngens-1, self.domain) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_factor_list_include(self, f): + factors = dmp_factor_list_include(self.to_dense(f), self.ngens-1, self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dup_irreducible_p(self, f): + return dup_irreducible_p(self.to_dense(f), self.domain) + def dmp_irreducible_p(self, f): + return dmp_irreducible_p(self.to_dense(f), self.ngens-1, self.domain) + + def dup_sturm(self, f): + seq = dup_sturm(self.to_dense(f), self.domain) + return list(map(self.from_dense, seq)) + + def dup_sqf_p(self, f): + return dup_sqf_p(self.to_dense(f), self.domain) + def dmp_sqf_p(self, f): + return dmp_sqf_p(self.to_dense(f), self.ngens-1, self.domain) + + def dmp_norm(self, f): + n = dmp_norm(self.to_dense(f), self.ngens-1, self.domain) + return self.to_ground().from_dense(n) + + def dup_sqf_norm(self, f): + s, F, R = dup_sqf_norm(self.to_dense(f), self.domain) + return (s, self.from_dense(F), self.to_ground().from_dense(R)) + def dmp_sqf_norm(self, f): + s, F, R = dmp_sqf_norm(self.to_dense(f), self.ngens-1, self.domain) + return (s, self.from_dense(F), self.to_ground().from_dense(R)) + + def dup_gf_sqf_part(self, f): + return self.from_dense(dup_gf_sqf_part(self.to_dense(f), self.domain)) + def dmp_gf_sqf_part(self, f): + return self.from_dense(dmp_gf_sqf_part(self.to_dense(f), self.domain)) + def dup_sqf_part(self, f): + return self.from_dense(dup_sqf_part(self.to_dense(f), self.domain)) + def dmp_sqf_part(self, f): + return self.from_dense(dmp_sqf_part(self.to_dense(f), self.ngens-1, self.domain)) + + def dup_gf_sqf_list(self, f, all=False): + coeff, factors = dup_gf_sqf_list(self.to_dense(f), self.domain, all=all) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_gf_sqf_list(self, f, all=False): + coeff, factors = dmp_gf_sqf_list(self.to_dense(f), self.ngens-1, self.domain, all=all) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + + def dup_sqf_list(self, f, all=False): + coeff, factors = dup_sqf_list(self.to_dense(f), self.domain, all=all) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dup_sqf_list_include(self, f, all=False): + factors = dup_sqf_list_include(self.to_dense(f), self.domain, all=all) + return [ (self.from_dense(g), k) for g, k in factors ] + def dmp_sqf_list(self, f, all=False): + coeff, factors = dmp_sqf_list(self.to_dense(f), self.ngens-1, self.domain, all=all) + return (coeff, [ (self.from_dense(g), k) for g, k in factors ]) + def dmp_sqf_list_include(self, f, all=False): + factors = dmp_sqf_list_include(self.to_dense(f), self.ngens-1, self.domain, all=all) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dup_gff_list(self, f): + factors = dup_gff_list(self.to_dense(f), self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + def dmp_gff_list(self, f): + factors = dmp_gff_list(self.to_dense(f), self.ngens-1, self.domain) + return [ (self.from_dense(g), k) for g, k in factors ] + + def dup_root_upper_bound(self, f): + return dup_root_upper_bound(self.to_dense(f), self.domain) + def dup_root_lower_bound(self, f): + return dup_root_lower_bound(self.to_dense(f), self.domain) + + def dup_step_refine_real_root(self, f, M, fast=False): + return dup_step_refine_real_root(self.to_dense(f), M, self.domain, fast=fast) + def dup_inner_refine_real_root(self, f, M, eps=None, steps=None, disjoint=None, fast=False, mobius=False): + return dup_inner_refine_real_root(self.to_dense(f), M, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast, mobius=mobius) + def dup_outer_refine_real_root(self, f, s, t, eps=None, steps=None, disjoint=None, fast=False): + return dup_outer_refine_real_root(self.to_dense(f), s, t, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast) + def dup_refine_real_root(self, f, s, t, eps=None, steps=None, disjoint=None, fast=False): + return dup_refine_real_root(self.to_dense(f), s, t, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast) + def dup_inner_isolate_real_roots(self, f, eps=None, fast=False): + return dup_inner_isolate_real_roots(self.to_dense(f), self.domain, eps=eps, fast=fast) + def dup_inner_isolate_positive_roots(self, f, eps=None, inf=None, sup=None, fast=False, mobius=False): + return dup_inner_isolate_positive_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, mobius=mobius) + def dup_inner_isolate_negative_roots(self, f, inf=None, sup=None, eps=None, fast=False, mobius=False): + return dup_inner_isolate_negative_roots(self.to_dense(f), self.domain, inf=inf, sup=sup, eps=eps, fast=fast, mobius=mobius) + def dup_isolate_real_roots_sqf(self, f, eps=None, inf=None, sup=None, fast=False, blackbox=False): + return dup_isolate_real_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, blackbox=blackbox) + def dup_isolate_real_roots(self, f, eps=None, inf=None, sup=None, basis=False, fast=False): + return dup_isolate_real_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, basis=basis, fast=fast) + def dup_isolate_real_roots_list(self, polys, eps=None, inf=None, sup=None, strict=False, basis=False, fast=False): + return dup_isolate_real_roots_list(list(map(self.to_dense, polys)), self.domain, eps=eps, inf=inf, sup=sup, strict=strict, basis=basis, fast=fast) + def dup_count_real_roots(self, f, inf=None, sup=None): + return dup_count_real_roots(self.to_dense(f), self.domain, inf=inf, sup=sup) + def dup_count_complex_roots(self, f, inf=None, sup=None, exclude=None): + return dup_count_complex_roots(self.to_dense(f), self.domain, inf=inf, sup=sup, exclude=exclude) + def dup_isolate_complex_roots_sqf(self, f, eps=None, inf=None, sup=None, blackbox=False): + return dup_isolate_complex_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, blackbox=blackbox) + def dup_isolate_all_roots_sqf(self, f, eps=None, inf=None, sup=None, fast=False, blackbox=False): + return dup_isolate_all_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, blackbox=blackbox) + def dup_isolate_all_roots(self, f, eps=None, inf=None, sup=None, fast=False): + return dup_isolate_all_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast) + + def fateman_poly_F_1(self): + from sympy.polys.specialpolys import dmp_fateman_poly_F_1 + return tuple(map(self.from_dense, dmp_fateman_poly_F_1(self.ngens-1, self.domain))) + def fateman_poly_F_2(self): + from sympy.polys.specialpolys import dmp_fateman_poly_F_2 + return tuple(map(self.from_dense, dmp_fateman_poly_F_2(self.ngens-1, self.domain))) + def fateman_poly_F_3(self): + from sympy.polys.specialpolys import dmp_fateman_poly_F_3 + return tuple(map(self.from_dense, dmp_fateman_poly_F_3(self.ngens-1, self.domain))) + + def to_gf_dense(self, element): + return gf_strip([ self.domain.dom.convert(c, self.domain) for c in self.wrap(element).to_dense() ]) + + def from_gf_dense(self, element): + return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain.dom)) + + def gf_degree(self, f): + return gf_degree(self.to_gf_dense(f)) + + def gf_LC(self, f): + return gf_LC(self.to_gf_dense(f), self.domain.dom) + def gf_TC(self, f): + return gf_TC(self.to_gf_dense(f), self.domain.dom) + + def gf_strip(self, f): + return self.from_gf_dense(gf_strip(self.to_gf_dense(f))) + def gf_trunc(self, f): + return self.from_gf_dense(gf_strip(self.to_gf_dense(f), self.domain.mod)) + def gf_normal(self, f): + return self.from_gf_dense(gf_strip(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + + def gf_from_dict(self, f): + return self.from_gf_dense(gf_from_dict(f, self.domain.mod, self.domain.dom)) + def gf_to_dict(self, f, symmetric=True): + return gf_to_dict(self.to_gf_dense(f), self.domain.mod, symmetric=symmetric) + + def gf_from_int_poly(self, f): + return self.from_gf_dense(gf_from_int_poly(f, self.domain.mod)) + def gf_to_int_poly(self, f, symmetric=True): + return gf_to_int_poly(self.to_gf_dense(f), self.domain.mod, symmetric=symmetric) + + def gf_neg(self, f): + return self.from_gf_dense(gf_neg(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + + def gf_add_ground(self, f, a): + return self.from_gf_dense(gf_add_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom)) + def gf_sub_ground(self, f, a): + return self.from_gf_dense(gf_sub_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom)) + def gf_mul_ground(self, f, a): + return self.from_gf_dense(gf_mul_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom)) + def gf_quo_ground(self, f, a): + return self.from_gf_dense(gf_quo_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom)) + + def gf_add(self, f, g): + return self.from_gf_dense(gf_add(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_sub(self, f, g): + return self.from_gf_dense(gf_sub(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_mul(self, f, g): + return self.from_gf_dense(gf_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_sqr(self, f): + return self.from_gf_dense(gf_sqr(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + + def gf_add_mul(self, f, g, h): + return self.from_gf_dense(gf_add_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.to_gf_dense(h), self.domain.mod, self.domain.dom)) + def gf_sub_mul(self, f, g, h): + return self.from_gf_dense(gf_sub_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.to_gf_dense(h), self.domain.mod, self.domain.dom)) + + def gf_expand(self, F): + return self.from_gf_dense(gf_expand(list(map(self.to_gf_dense, F)), self.domain.mod, self.domain.dom)) + + def gf_div(self, f, g): + q, r = gf_div(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom) + return self.from_gf_dense(q), self.from_gf_dense(r) + def gf_rem(self, f, g): + return self.from_gf_dense(gf_rem(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_quo(self, f, g): + return self.from_gf_dense(gf_quo(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_exquo(self, f, g): + return self.from_gf_dense(gf_exquo(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + + def gf_lshift(self, f, n): + return self.from_gf_dense(gf_lshift(self.to_gf_dense(f), n, self.domain.dom)) + def gf_rshift(self, f, n): + return self.from_gf_dense(gf_rshift(self.to_gf_dense(f), n, self.domain.dom)) + + def gf_pow(self, f, n): + return self.from_gf_dense(gf_pow(self.to_gf_dense(f), n, self.domain.mod, self.domain.dom)) + def gf_pow_mod(self, f, n, g): + return self.from_gf_dense(gf_pow_mod(self.to_gf_dense(f), n, self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + + def gf_cofactors(self, f, g): + h, cff, cfg = gf_cofactors(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom) + return self.from_gf_dense(h), self.from_gf_dense(cff), self.from_gf_dense(cfg) + def gf_gcd(self, f, g): + return self.from_gf_dense(gf_gcd(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_lcm(self, f, g): + return self.from_gf_dense(gf_lcm(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_gcdex(self, f, g): + return self.from_gf_dense(gf_gcdex(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + + def gf_monic(self, f): + return self.from_gf_dense(gf_monic(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + def gf_diff(self, f): + return self.from_gf_dense(gf_diff(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + + def gf_eval(self, f, a): + return gf_eval(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom) + def gf_multi_eval(self, f, A): + return gf_multi_eval(self.to_gf_dense(f), A, self.domain.mod, self.domain.dom) + + def gf_compose(self, f, g): + return self.from_gf_dense(gf_compose(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)) + def gf_compose_mod(self, g, h, f): + return self.from_gf_dense(gf_compose_mod(self.to_gf_dense(g), self.to_gf_dense(h), self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + + def gf_trace_map(self, a, b, c, n, f): + a = self.to_gf_dense(a) + b = self.to_gf_dense(b) + c = self.to_gf_dense(c) + f = self.to_gf_dense(f) + U, V = gf_trace_map(a, b, c, n, f, self.domain.mod, self.domain.dom) + return self.from_gf_dense(U), self.from_gf_dense(V) + + def gf_random(self, n): + return self.from_gf_dense(gf_random(n, self.domain.mod, self.domain.dom)) + def gf_irreducible(self, n): + return self.from_gf_dense(gf_irreducible(n, self.domain.mod, self.domain.dom)) + + def gf_irred_p_ben_or(self, f): + return gf_irred_p_ben_or(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + def gf_irred_p_rabin(self, f): + return gf_irred_p_rabin(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + def gf_irreducible_p(self, f): + return gf_irreducible_p(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + def gf_sqf_p(self, f): + return gf_sqf_p(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + + def gf_sqf_part(self, f): + return self.from_gf_dense(gf_sqf_part(self.to_gf_dense(f), self.domain.mod, self.domain.dom)) + def gf_sqf_list(self, f, all=False): + coeff, factors = gf_sqf_part(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return coeff, [ (self.from_gf_dense(g), k) for g, k in factors ] + + def gf_Qmatrix(self, f): + return gf_Qmatrix(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + def gf_berlekamp(self, f): + factors = gf_berlekamp(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ self.from_gf_dense(g) for g in factors ] + + def gf_ddf_zassenhaus(self, f): + factors = gf_ddf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ (self.from_gf_dense(g), k) for g, k in factors ] + def gf_edf_zassenhaus(self, f, n): + factors = gf_edf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ self.from_gf_dense(g) for g in factors ] + + def gf_ddf_shoup(self, f): + factors = gf_ddf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ (self.from_gf_dense(g), k) for g, k in factors ] + def gf_edf_shoup(self, f, n): + factors = gf_edf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ self.from_gf_dense(g) for g in factors ] + + def gf_zassenhaus(self, f): + factors = gf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ self.from_gf_dense(g) for g in factors ] + def gf_shoup(self, f): + factors = gf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return [ self.from_gf_dense(g) for g in factors ] + + def gf_factor_sqf(self, f, method=None): + coeff, factors = gf_factor_sqf(self.to_gf_dense(f), self.domain.mod, self.domain.dom, method=method) + return coeff, [ self.from_gf_dense(g) for g in factors ] + def gf_factor(self, f): + coeff, factors = gf_factor(self.to_gf_dense(f), self.domain.mod, self.domain.dom) + return coeff, [ (self.from_gf_dense(g), k) for g, k in factors ] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/constructor.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/constructor.py new file mode 100644 index 0000000000000000000000000000000000000000..49ce4782b987419ee8b736974f8755301380bdda --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/constructor.py @@ -0,0 +1,387 @@ +"""Tools for constructing domains for expressions. """ +from math import prod + +from sympy.core import sympify +from sympy.core.evalf import pure_complex +from sympy.core.sorting import ordered +from sympy.polys.domains import ZZ, QQ, ZZ_I, QQ_I, EX +from sympy.polys.domains.complexfield import ComplexField +from sympy.polys.domains.realfield import RealField +from sympy.polys.polyoptions import build_options +from sympy.polys.polyutils import parallel_dict_from_basic +from sympy.utilities import public + + +def _construct_simple(coeffs, opt): + """Handle simple domains, e.g.: ZZ, QQ, RR and algebraic domains. """ + rationals = floats = complexes = algebraics = False + float_numbers = [] + + if opt.extension is True: + is_algebraic = lambda coeff: coeff.is_number and coeff.is_algebraic + else: + is_algebraic = lambda coeff: False + + for coeff in coeffs: + if coeff.is_Rational: + if not coeff.is_Integer: + rationals = True + elif coeff.is_Float: + if algebraics: + # there are both reals and algebraics -> EX + return False + else: + floats = True + float_numbers.append(coeff) + else: + is_complex = pure_complex(coeff) + if is_complex: + complexes = True + x, y = is_complex + if x.is_Rational and y.is_Rational: + if not (x.is_Integer and y.is_Integer): + rationals = True + continue + else: + floats = True + if x.is_Float: + float_numbers.append(x) + if y.is_Float: + float_numbers.append(y) + elif is_algebraic(coeff): + if floats: + # there are both algebraics and reals -> EX + return False + algebraics = True + else: + # this is a composite domain, e.g. ZZ[X], EX + return None + + # Use the maximum precision of all coefficients for the RR or CC + # precision + max_prec = max(c._prec for c in float_numbers) if float_numbers else 53 + + if algebraics: + domain, result = _construct_algebraic(coeffs, opt) + else: + if floats and complexes: + domain = ComplexField(prec=max_prec) + elif floats: + domain = RealField(prec=max_prec) + elif rationals or opt.field: + domain = QQ_I if complexes else QQ + else: + domain = ZZ_I if complexes else ZZ + + result = [domain.from_sympy(coeff) for coeff in coeffs] + + return domain, result + + +def _construct_algebraic(coeffs, opt): + """We know that coefficients are algebraic so construct the extension. """ + from sympy.polys.numberfields import primitive_element + + exts = set() + + def build_trees(args): + trees = [] + for a in args: + if a.is_Rational: + tree = ('Q', QQ.from_sympy(a)) + elif a.is_Add: + tree = ('+', build_trees(a.args)) + elif a.is_Mul: + tree = ('*', build_trees(a.args)) + else: + tree = ('e', a) + exts.add(a) + trees.append(tree) + return trees + + trees = build_trees(coeffs) + exts = list(ordered(exts)) + + g, span, H = primitive_element(exts, ex=True, polys=True) + root = sum(s*ext for s, ext in zip(span, exts)) + + domain, g = QQ.algebraic_field((g, root)), g.rep.to_list() + + exts_dom = [domain.dtype.from_list(h, g, QQ) for h in H] + exts_map = dict(zip(exts, exts_dom)) + + def convert_tree(tree): + op, args = tree + if op == 'Q': + return domain.dtype.from_list([args], g, QQ) + elif op == '+': + return sum((convert_tree(a) for a in args), domain.zero) + elif op == '*': + return prod(convert_tree(a) for a in args) + elif op == 'e': + return exts_map[args] + else: + raise RuntimeError + + result = [convert_tree(tree) for tree in trees] + + return domain, result + + +def _construct_composite(coeffs, opt): + """Handle composite domains, e.g.: ZZ[X], QQ[X], ZZ(X), QQ(X). """ + numers, denoms = [], [] + + for coeff in coeffs: + numer, denom = coeff.as_numer_denom() + + numers.append(numer) + denoms.append(denom) + + polys, gens = parallel_dict_from_basic(numers + denoms) # XXX: sorting + if not gens: + return None + + if opt.composite is None: + if any(gen.is_number and gen.is_algebraic for gen in gens): + return None # generators are number-like so lets better use EX + + all_symbols = set() + + for gen in gens: + symbols = gen.free_symbols + + if all_symbols & symbols: + return None # there could be algebraic relations between generators + else: + all_symbols |= symbols + + n = len(gens) + k = len(polys)//2 + + numers = polys[:k] + denoms = polys[k:] + + if opt.field: + fractions = True + else: + fractions, zeros = False, (0,)*n + + for denom in denoms: + if len(denom) > 1 or zeros not in denom: + fractions = True + break + + coeffs = set() + + if not fractions: + for numer, denom in zip(numers, denoms): + denom = denom[zeros] + + for monom, coeff in numer.items(): + coeff /= denom + coeffs.add(coeff) + numer[monom] = coeff + else: + for numer, denom in zip(numers, denoms): + coeffs.update(list(numer.values())) + coeffs.update(list(denom.values())) + + rationals = floats = complexes = False + float_numbers = [] + + for coeff in coeffs: + if coeff.is_Rational: + if not coeff.is_Integer: + rationals = True + elif coeff.is_Float: + floats = True + float_numbers.append(coeff) + else: + is_complex = pure_complex(coeff) + if is_complex is not None: + complexes = True + x, y = is_complex + if x.is_Rational and y.is_Rational: + if not (x.is_Integer and y.is_Integer): + rationals = True + else: + floats = True + if x.is_Float: + float_numbers.append(x) + if y.is_Float: + float_numbers.append(y) + + max_prec = max(c._prec for c in float_numbers) if float_numbers else 53 + + if floats and complexes: + ground = ComplexField(prec=max_prec) + elif floats: + ground = RealField(prec=max_prec) + elif complexes: + if rationals: + ground = QQ_I + else: + ground = ZZ_I + elif rationals: + ground = QQ + else: + ground = ZZ + + result = [] + + if not fractions: + domain = ground.poly_ring(*gens) + + for numer in numers: + for monom, coeff in numer.items(): + numer[monom] = ground.from_sympy(coeff) + + result.append(domain(numer)) + else: + domain = ground.frac_field(*gens) + + for numer, denom in zip(numers, denoms): + for monom, coeff in numer.items(): + numer[monom] = ground.from_sympy(coeff) + + for monom, coeff in denom.items(): + denom[monom] = ground.from_sympy(coeff) + + result.append(domain((numer, denom))) + + return domain, result + + +def _construct_expression(coeffs, opt): + """The last resort case, i.e. use the expression domain. """ + domain, result = EX, [] + + for coeff in coeffs: + result.append(domain.from_sympy(coeff)) + + return domain, result + + +@public +def construct_domain(obj, **args): + """Construct a minimal domain for a list of expressions. + + Explanation + =========== + + Given a list of normal SymPy expressions (of type :py:class:`~.Expr`) + ``construct_domain`` will find a minimal :py:class:`~.Domain` that can + represent those expressions. The expressions will be converted to elements + of the domain and both the domain and the domain elements are returned. + + Parameters + ========== + + obj: list or dict + The expressions to build a domain for. + + **args: keyword arguments + Options that affect the choice of domain. + + Returns + ======= + + (K, elements): Domain and list of domain elements + The domain K that can represent the expressions and the list or dict + of domain elements representing the same expressions as elements of K. + + Examples + ======== + + Given a list of :py:class:`~.Integer` ``construct_domain`` will return the + domain :ref:`ZZ` and a list of integers as elements of :ref:`ZZ`. + + >>> from sympy import construct_domain, S + >>> expressions = [S(2), S(3), S(4)] + >>> K, elements = construct_domain(expressions) + >>> K + ZZ + >>> elements + [2, 3, 4] + >>> type(elements[0]) # doctest: +SKIP + + >>> type(expressions[0]) + + + If there are any :py:class:`~.Rational` then :ref:`QQ` is returned + instead. + + >>> construct_domain([S(1)/2, S(3)/4]) + (QQ, [1/2, 3/4]) + + If there are symbols then a polynomial ring :ref:`K[x]` is returned. + + >>> from sympy import symbols + >>> x, y = symbols('x, y') + >>> construct_domain([2*x + 1, S(3)/4]) + (QQ[x], [2*x + 1, 3/4]) + >>> construct_domain([2*x + 1, y]) + (ZZ[x,y], [2*x + 1, y]) + + If any symbols appear with negative powers then a rational function field + :ref:`K(x)` will be returned. + + >>> construct_domain([y/x, x/(1 - y)]) + (ZZ(x,y), [y/x, -x/(y - 1)]) + + Irrational algebraic numbers will result in the :ref:`EX` domain by + default. The keyword argument ``extension=True`` leads to the construction + of an algebraic number field :ref:`QQ(a)`. + + >>> from sympy import sqrt + >>> construct_domain([sqrt(2)]) + (EX, [EX(sqrt(2))]) + >>> construct_domain([sqrt(2)], extension=True) # doctest: +SKIP + (QQ, [ANP([1, 0], [1, 0, -2], QQ)]) + + See also + ======== + + Domain + Expr + """ + opt = build_options(args) + + if hasattr(obj, '__iter__'): + if isinstance(obj, dict): + if not obj: + monoms, coeffs = [], [] + else: + monoms, coeffs = list(zip(*list(obj.items()))) + else: + coeffs = obj + else: + coeffs = [obj] + + coeffs = list(map(sympify, coeffs)) + result = _construct_simple(coeffs, opt) + + if result is not None: + if result is not False: + domain, coeffs = result + else: + domain, coeffs = _construct_expression(coeffs, opt) + else: + if opt.composite is False: + result = None + else: + result = _construct_composite(coeffs, opt) + + if result is not None: + domain, coeffs = result + else: + domain, coeffs = _construct_expression(coeffs, opt) + + if hasattr(obj, '__iter__'): + if isinstance(obj, dict): + return domain, dict(list(zip(monoms, coeffs))) + else: + return domain, coeffs + else: + return domain, coeffs[0] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densearith.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densearith.py new file mode 100644 index 0000000000000000000000000000000000000000..1088691ca3fb020e9074c1c7c017c1baaba637c8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densearith.py @@ -0,0 +1,1875 @@ +"""Arithmetics for dense recursive polynomials in ``K[x]`` or ``K[X]``. """ + + +from sympy.polys.densebasic import ( + dup_slice, + dup_LC, dmp_LC, + dup_degree, dmp_degree, + dup_strip, dmp_strip, + dmp_zero_p, dmp_zero, + dmp_one_p, dmp_one, + dmp_ground, dmp_zeros) +from sympy.polys.polyerrors import (ExactQuotientFailed, PolynomialDivisionFailed) + +def dup_add_term(f, c, i, K): + """ + Add ``c*x**i`` to ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_add_term(x**2 - 1, ZZ(2), 4) + 2*x**4 + x**2 - 1 + + """ + if not c: + return f + + n = len(f) + m = n - i - 1 + + if i == n - 1: + return dup_strip([f[0] + c] + f[1:]) + else: + if i >= n: + return [c] + [K.zero]*(i - n) + f + else: + return f[:m] + [f[m] + c] + f[m + 1:] + + +def dmp_add_term(f, c, i, u, K): + """ + Add ``c(x_2..x_u)*x_0**i`` to ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_add_term(x*y + 1, 2, 2) + 2*x**2 + x*y + 1 + + """ + if not u: + return dup_add_term(f, c, i, K) + + v = u - 1 + + if dmp_zero_p(c, v): + return f + + n = len(f) + m = n - i - 1 + + if i == n - 1: + return dmp_strip([dmp_add(f[0], c, v, K)] + f[1:], u) + else: + if i >= n: + return [c] + dmp_zeros(i - n, v, K) + f + else: + return f[:m] + [dmp_add(f[m], c, v, K)] + f[m + 1:] + + +def dup_sub_term(f, c, i, K): + """ + Subtract ``c*x**i`` from ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sub_term(2*x**4 + x**2 - 1, ZZ(2), 4) + x**2 - 1 + + """ + if not c: + return f + + n = len(f) + m = n - i - 1 + + if i == n - 1: + return dup_strip([f[0] - c] + f[1:]) + else: + if i >= n: + return [-c] + [K.zero]*(i - n) + f + else: + return f[:m] + [f[m] - c] + f[m + 1:] + + +def dmp_sub_term(f, c, i, u, K): + """ + Subtract ``c(x_2..x_u)*x_0**i`` from ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sub_term(2*x**2 + x*y + 1, 2, 2) + x*y + 1 + + """ + if not u: + return dup_add_term(f, -c, i, K) + + v = u - 1 + + if dmp_zero_p(c, v): + return f + + n = len(f) + m = n - i - 1 + + if i == n - 1: + return dmp_strip([dmp_sub(f[0], c, v, K)] + f[1:], u) + else: + if i >= n: + return [dmp_neg(c, v, K)] + dmp_zeros(i - n, v, K) + f + else: + return f[:m] + [dmp_sub(f[m], c, v, K)] + f[m + 1:] + + +def dup_mul_term(f, c, i, K): + """ + Multiply ``f`` by ``c*x**i`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_mul_term(x**2 - 1, ZZ(3), 2) + 3*x**4 - 3*x**2 + + """ + if not c or not f: + return [] + else: + return [ cf * c for cf in f ] + [K.zero]*i + + +def dmp_mul_term(f, c, i, u, K): + """ + Multiply ``f`` by ``c(x_2..x_u)*x_0**i`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_mul_term(x**2*y + x, 3*y, 2) + 3*x**4*y**2 + 3*x**3*y + + """ + if not u: + return dup_mul_term(f, c, i, K) + + v = u - 1 + + if dmp_zero_p(f, u): + return f + if dmp_zero_p(c, v): + return dmp_zero(u) + else: + return [ dmp_mul(cf, c, v, K) for cf in f ] + dmp_zeros(i, v, K) + + +def dup_add_ground(f, c, K): + """ + Add an element of the ground domain to ``f``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_add_ground(x**3 + 2*x**2 + 3*x + 4, ZZ(4)) + x**3 + 2*x**2 + 3*x + 8 + + """ + return dup_add_term(f, c, 0, K) + + +def dmp_add_ground(f, c, u, K): + """ + Add an element of the ground domain to ``f``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_add_ground(x**3 + 2*x**2 + 3*x + 4, ZZ(4)) + x**3 + 2*x**2 + 3*x + 8 + + """ + return dmp_add_term(f, dmp_ground(c, u - 1), 0, u, K) + + +def dup_sub_ground(f, c, K): + """ + Subtract an element of the ground domain from ``f``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sub_ground(x**3 + 2*x**2 + 3*x + 4, ZZ(4)) + x**3 + 2*x**2 + 3*x + + """ + return dup_sub_term(f, c, 0, K) + + +def dmp_sub_ground(f, c, u, K): + """ + Subtract an element of the ground domain from ``f``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sub_ground(x**3 + 2*x**2 + 3*x + 4, ZZ(4)) + x**3 + 2*x**2 + 3*x + + """ + return dmp_sub_term(f, dmp_ground(c, u - 1), 0, u, K) + + +def dup_mul_ground(f, c, K): + """ + Multiply ``f`` by a constant value in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_mul_ground(x**2 + 2*x - 1, ZZ(3)) + 3*x**2 + 6*x - 3 + + """ + if not c or not f: + return [] + else: + return [ cf * c for cf in f ] + + +def dmp_mul_ground(f, c, u, K): + """ + Multiply ``f`` by a constant value in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_mul_ground(2*x + 2*y, ZZ(3)) + 6*x + 6*y + + """ + if not u: + return dup_mul_ground(f, c, K) + + v = u - 1 + + return [ dmp_mul_ground(cf, c, v, K) for cf in f ] + + +def dup_quo_ground(f, c, K): + """ + Quotient by a constant in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> R.dup_quo_ground(3*x**2 + 2, ZZ(2)) + x**2 + 1 + + >>> R, x = ring("x", QQ) + >>> R.dup_quo_ground(3*x**2 + 2, QQ(2)) + 3/2*x**2 + 1 + + """ + if not c: + raise ZeroDivisionError('polynomial division') + if not f: + return f + + if K.is_Field: + return [ K.quo(cf, c) for cf in f ] + else: + return [ cf // c for cf in f ] + + +def dmp_quo_ground(f, c, u, K): + """ + Quotient by a constant in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> R.dmp_quo_ground(2*x**2*y + 3*x, ZZ(2)) + x**2*y + x + + >>> R, x,y = ring("x,y", QQ) + >>> R.dmp_quo_ground(2*x**2*y + 3*x, QQ(2)) + x**2*y + 3/2*x + + """ + if not u: + return dup_quo_ground(f, c, K) + + v = u - 1 + + return [ dmp_quo_ground(cf, c, v, K) for cf in f ] + + +def dup_exquo_ground(f, c, K): + """ + Exact quotient by a constant in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> R.dup_exquo_ground(x**2 + 2, QQ(2)) + 1/2*x**2 + 1 + + """ + if not c: + raise ZeroDivisionError('polynomial division') + if not f: + return f + + return [ K.exquo(cf, c) for cf in f ] + + +def dmp_exquo_ground(f, c, u, K): + """ + Exact quotient by a constant in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> R.dmp_exquo_ground(x**2*y + 2*x, QQ(2)) + 1/2*x**2*y + x + + """ + if not u: + return dup_exquo_ground(f, c, K) + + v = u - 1 + + return [ dmp_exquo_ground(cf, c, v, K) for cf in f ] + + +def dup_lshift(f, n, K): + """ + Efficiently multiply ``f`` by ``x**n`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_lshift(x**2 + 1, 2) + x**4 + x**2 + + """ + if not f: + return f + else: + return f + [K.zero]*n + + +def dup_rshift(f, n, K): + """ + Efficiently divide ``f`` by ``x**n`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_rshift(x**4 + x**2, 2) + x**2 + 1 + >>> R.dup_rshift(x**4 + x**2 + 2, 2) + x**2 + 1 + + """ + return f[:-n] + + +def dup_abs(f, K): + """ + Make all coefficients positive in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_abs(x**2 - 1) + x**2 + 1 + + """ + return [ K.abs(coeff) for coeff in f ] + + +def dmp_abs(f, u, K): + """ + Make all coefficients positive in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_abs(x**2*y - x) + x**2*y + x + + """ + if not u: + return dup_abs(f, K) + + v = u - 1 + + return [ dmp_abs(cf, v, K) for cf in f ] + + +def dup_neg(f, K): + """ + Negate a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_neg(x**2 - 1) + -x**2 + 1 + + """ + return [ -coeff for coeff in f ] + + +def dmp_neg(f, u, K): + """ + Negate a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_neg(x**2*y - x) + -x**2*y + x + + """ + if not u: + return dup_neg(f, K) + + v = u - 1 + + return [ dmp_neg(cf, v, K) for cf in f ] + + +def dup_add(f, g, K): + """ + Add dense polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_add(x**2 - 1, x - 2) + x**2 + x - 3 + + """ + if not f: + return g + if not g: + return f + + df = dup_degree(f) + dg = dup_degree(g) + + if df == dg: + return dup_strip([ a + b for a, b in zip(f, g) ]) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = g[:k], g[k:] + + return h + [ a + b for a, b in zip(f, g) ] + + +def dmp_add(f, g, u, K): + """ + Add dense polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_add(x**2 + y, x**2*y + x) + x**2*y + x**2 + x + y + + """ + if not u: + return dup_add(f, g, K) + + df = dmp_degree(f, u) + + if df < 0: + return g + + dg = dmp_degree(g, u) + + if dg < 0: + return f + + v = u - 1 + + if df == dg: + return dmp_strip([ dmp_add(a, b, v, K) for a, b in zip(f, g) ], u) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = g[:k], g[k:] + + return h + [ dmp_add(a, b, v, K) for a, b in zip(f, g) ] + + +def dup_sub(f, g, K): + """ + Subtract dense polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sub(x**2 - 1, x - 2) + x**2 - x + 1 + + """ + if not f: + return dup_neg(g, K) + if not g: + return f + + df = dup_degree(f) + dg = dup_degree(g) + + if df == dg: + return dup_strip([ a - b for a, b in zip(f, g) ]) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = dup_neg(g[:k], K), g[k:] + + return h + [ a - b for a, b in zip(f, g) ] + + +def dmp_sub(f, g, u, K): + """ + Subtract dense polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sub(x**2 + y, x**2*y + x) + -x**2*y + x**2 - x + y + + """ + if not u: + return dup_sub(f, g, K) + + df = dmp_degree(f, u) + + if df < 0: + return dmp_neg(g, u, K) + + dg = dmp_degree(g, u) + + if dg < 0: + return f + + v = u - 1 + + if df == dg: + return dmp_strip([ dmp_sub(a, b, v, K) for a, b in zip(f, g) ], u) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = dmp_neg(g[:k], u, K), g[k:] + + return h + [ dmp_sub(a, b, v, K) for a, b in zip(f, g) ] + + +def dup_add_mul(f, g, h, K): + """ + Returns ``f + g*h`` where ``f, g, h`` are in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_add_mul(x**2 - 1, x - 2, x + 2) + 2*x**2 - 5 + + """ + return dup_add(f, dup_mul(g, h, K), K) + + +def dmp_add_mul(f, g, h, u, K): + """ + Returns ``f + g*h`` where ``f, g, h`` are in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_add_mul(x**2 + y, x, x + 2) + 2*x**2 + 2*x + y + + """ + return dmp_add(f, dmp_mul(g, h, u, K), u, K) + + +def dup_sub_mul(f, g, h, K): + """ + Returns ``f - g*h`` where ``f, g, h`` are in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sub_mul(x**2 - 1, x - 2, x + 2) + 3 + + """ + return dup_sub(f, dup_mul(g, h, K), K) + + +def dmp_sub_mul(f, g, h, u, K): + """ + Returns ``f - g*h`` where ``f, g, h`` are in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sub_mul(x**2 + y, x, x + 2) + -2*x + y + + """ + return dmp_sub(f, dmp_mul(g, h, u, K), u, K) + + +def dup_mul(f, g, K): + """ + Multiply dense polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_mul(x - 2, x + 2) + x**2 - 4 + + """ + if f == g: + return dup_sqr(f, K) + + if not (f and g): + return [] + + df = dup_degree(f) + dg = dup_degree(g) + + n = max(df, dg) + 1 + + if n < 100 or not K.is_Exact: + h = [] + + for i in range(0, df + dg + 1): + coeff = K.zero + + for j in range(max(0, i - dg), min(df, i) + 1): + coeff += f[j]*g[i - j] + + h.append(coeff) + + return dup_strip(h) + else: + # Use Karatsuba's algorithm (divide and conquer), see e.g.: + # Joris van der Hoeven, Relax But Don't Be Too Lazy, + # J. Symbolic Computation, 11 (2002), section 3.1.1. + n2 = n//2 + + fl, gl = dup_slice(f, 0, n2, K), dup_slice(g, 0, n2, K) + + fh = dup_rshift(dup_slice(f, n2, n, K), n2, K) + gh = dup_rshift(dup_slice(g, n2, n, K), n2, K) + + lo, hi = dup_mul(fl, gl, K), dup_mul(fh, gh, K) + + mid = dup_mul(dup_add(fl, fh, K), dup_add(gl, gh, K), K) + mid = dup_sub(mid, dup_add(lo, hi, K), K) + + return dup_add(dup_add(lo, dup_lshift(mid, n2, K), K), + dup_lshift(hi, 2*n2, K), K) + + +def dmp_mul(f, g, u, K): + """ + Multiply dense polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_mul(x*y + 1, x) + x**2*y + x + + """ + if not u: + return dup_mul(f, g, K) + + if f == g: + return dmp_sqr(f, u, K) + + df = dmp_degree(f, u) + + if df < 0: + return f + + dg = dmp_degree(g, u) + + if dg < 0: + return g + + h, v = [], u - 1 + + for i in range(0, df + dg + 1): + coeff = dmp_zero(v) + + for j in range(max(0, i - dg), min(df, i) + 1): + coeff = dmp_add(coeff, dmp_mul(f[j], g[i - j], v, K), v, K) + + h.append(coeff) + + return dmp_strip(h, u) + + +def dup_sqr(f, K): + """ + Square dense polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sqr(x**2 + 1) + x**4 + 2*x**2 + 1 + + """ + df, h = len(f) - 1, [] + + for i in range(0, 2*df + 1): + c = K.zero + + jmin = max(0, i - df) + jmax = min(i, df) + + n = jmax - jmin + 1 + + jmax = jmin + n // 2 - 1 + + for j in range(jmin, jmax + 1): + c += f[j]*f[i - j] + + c += c + + if n & 1: + elem = f[jmax + 1] + c += elem**2 + + h.append(c) + + return dup_strip(h) + + +def dmp_sqr(f, u, K): + """ + Square dense polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sqr(x**2 + x*y + y**2) + x**4 + 2*x**3*y + 3*x**2*y**2 + 2*x*y**3 + y**4 + + """ + if not u: + return dup_sqr(f, K) + + df = dmp_degree(f, u) + + if df < 0: + return f + + h, v = [], u - 1 + + for i in range(0, 2*df + 1): + c = dmp_zero(v) + + jmin = max(0, i - df) + jmax = min(i, df) + + n = jmax - jmin + 1 + + jmax = jmin + n // 2 - 1 + + for j in range(jmin, jmax + 1): + c = dmp_add(c, dmp_mul(f[j], f[i - j], v, K), v, K) + + c = dmp_mul_ground(c, K(2), v, K) + + if n & 1: + elem = dmp_sqr(f[jmax + 1], v, K) + c = dmp_add(c, elem, v, K) + + h.append(c) + + return dmp_strip(h, u) + + +def dup_pow(f, n, K): + """ + Raise ``f`` to the ``n``-th power in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_pow(x - 2, 3) + x**3 - 6*x**2 + 12*x - 8 + + """ + if not n: + return [K.one] + if n < 0: + raise ValueError("Cannot raise polynomial to a negative power") + if n == 1 or not f or f == [K.one]: + return f + + g = [K.one] + + while True: + n, m = n//2, n + + if m % 2: + g = dup_mul(g, f, K) + + if not n: + break + + f = dup_sqr(f, K) + + return g + + +def dmp_pow(f, n, u, K): + """ + Raise ``f`` to the ``n``-th power in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_pow(x*y + 1, 3) + x**3*y**3 + 3*x**2*y**2 + 3*x*y + 1 + + """ + if not u: + return dup_pow(f, n, K) + + if not n: + return dmp_one(u, K) + if n < 0: + raise ValueError("Cannot raise polynomial to a negative power") + if n == 1 or dmp_zero_p(f, u) or dmp_one_p(f, u, K): + return f + + g = dmp_one(u, K) + + while True: + n, m = n//2, n + + if m & 1: + g = dmp_mul(g, f, u, K) + + if not n: + break + + f = dmp_sqr(f, u, K) + + return g + + +def dup_pdiv(f, g, K): + """ + Polynomial pseudo-division in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_pdiv(x**2 + 1, 2*x - 4) + (2*x + 4, 20) + + """ + df = dup_degree(f) + dg = dup_degree(g) + + q, r, dr = [], f, df + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return q, r + + N = df - dg + 1 + lc_g = dup_LC(g, K) + + while True: + lc_r = dup_LC(r, K) + j, N = dr - dg, N - 1 + + Q = dup_mul_ground(q, lc_g, K) + q = dup_add_term(Q, lc_r, j, K) + + R = dup_mul_ground(r, lc_g, K) + G = dup_mul_term(g, lc_r, j, K) + r = dup_sub(R, G, K) + + _dr, dr = dr, dup_degree(r) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + c = lc_g**N + + q = dup_mul_ground(q, c, K) + r = dup_mul_ground(r, c, K) + + return q, r + + +def dup_prem(f, g, K): + """ + Polynomial pseudo-remainder in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_prem(x**2 + 1, 2*x - 4) + 20 + + """ + df = dup_degree(f) + dg = dup_degree(g) + + r, dr = f, df + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return r + + N = df - dg + 1 + lc_g = dup_LC(g, K) + + while True: + lc_r = dup_LC(r, K) + j, N = dr - dg, N - 1 + + R = dup_mul_ground(r, lc_g, K) + G = dup_mul_term(g, lc_r, j, K) + r = dup_sub(R, G, K) + + _dr, dr = dr, dup_degree(r) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + return dup_mul_ground(r, lc_g**N, K) + + +def dup_pquo(f, g, K): + """ + Polynomial exact pseudo-quotient in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_pquo(x**2 - 1, 2*x - 2) + 2*x + 2 + + >>> R.dup_pquo(x**2 + 1, 2*x - 4) + 2*x + 4 + + """ + return dup_pdiv(f, g, K)[0] + + +def dup_pexquo(f, g, K): + """ + Polynomial pseudo-quotient in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_pexquo(x**2 - 1, 2*x - 2) + 2*x + 2 + + >>> R.dup_pexquo(x**2 + 1, 2*x - 4) + Traceback (most recent call last): + ... + ExactQuotientFailed: [2, -4] does not divide [1, 0, 1] + + """ + q, r = dup_pdiv(f, g, K) + + if not r: + return q + else: + raise ExactQuotientFailed(f, g) + + +def dmp_pdiv(f, g, u, K): + """ + Polynomial pseudo-division in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_pdiv(x**2 + x*y, 2*x + 2) + (2*x + 2*y - 2, -4*y + 4) + + """ + if not u: + return dup_pdiv(f, g, K) + + df = dmp_degree(f, u) + dg = dmp_degree(g, u) + + if dg < 0: + raise ZeroDivisionError("polynomial division") + + q, r, dr = dmp_zero(u), f, df + + if df < dg: + return q, r + + N = df - dg + 1 + lc_g = dmp_LC(g, K) + + while True: + lc_r = dmp_LC(r, K) + j, N = dr - dg, N - 1 + + Q = dmp_mul_term(q, lc_g, 0, u, K) + q = dmp_add_term(Q, lc_r, j, u, K) + + R = dmp_mul_term(r, lc_g, 0, u, K) + G = dmp_mul_term(g, lc_r, j, u, K) + r = dmp_sub(R, G, u, K) + + _dr, dr = dr, dmp_degree(r, u) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + c = dmp_pow(lc_g, N, u - 1, K) + + q = dmp_mul_term(q, c, 0, u, K) + r = dmp_mul_term(r, c, 0, u, K) + + return q, r + + +def dmp_prem(f, g, u, K): + """ + Polynomial pseudo-remainder in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_prem(x**2 + x*y, 2*x + 2) + -4*y + 4 + + """ + if not u: + return dup_prem(f, g, K) + + df = dmp_degree(f, u) + dg = dmp_degree(g, u) + + if dg < 0: + raise ZeroDivisionError("polynomial division") + + r, dr = f, df + + if df < dg: + return r + + N = df - dg + 1 + lc_g = dmp_LC(g, K) + + while True: + lc_r = dmp_LC(r, K) + j, N = dr - dg, N - 1 + + R = dmp_mul_term(r, lc_g, 0, u, K) + G = dmp_mul_term(g, lc_r, j, u, K) + r = dmp_sub(R, G, u, K) + + _dr, dr = dr, dmp_degree(r, u) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + c = dmp_pow(lc_g, N, u - 1, K) + + return dmp_mul_term(r, c, 0, u, K) + + +def dmp_pquo(f, g, u, K): + """ + Polynomial exact pseudo-quotient in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2*y + >>> h = 2*x + 2 + + >>> R.dmp_pquo(f, g) + 2*x + + >>> R.dmp_pquo(f, h) + 2*x + 2*y - 2 + + """ + return dmp_pdiv(f, g, u, K)[0] + + +def dmp_pexquo(f, g, u, K): + """ + Polynomial pseudo-quotient in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2*y + >>> h = 2*x + 2 + + >>> R.dmp_pexquo(f, g) + 2*x + + >>> R.dmp_pexquo(f, h) + Traceback (most recent call last): + ... + ExactQuotientFailed: [[2], [2]] does not divide [[1], [1, 0], []] + + """ + q, r = dmp_pdiv(f, g, u, K) + + if dmp_zero_p(r, u): + return q + else: + raise ExactQuotientFailed(f, g) + + +def dup_rr_div(f, g, K): + """ + Univariate division with remainder over a ring. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_rr_div(x**2 + 1, 2*x - 4) + (0, x**2 + 1) + + """ + df = dup_degree(f) + dg = dup_degree(g) + + q, r, dr = [], f, df + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return q, r + + lc_g = dup_LC(g, K) + + while True: + lc_r = dup_LC(r, K) + + if lc_r % lc_g: + break + + c = K.exquo(lc_r, lc_g) + j = dr - dg + + q = dup_add_term(q, c, j, K) + h = dup_mul_term(g, c, j, K) + r = dup_sub(r, h, K) + + _dr, dr = dr, dup_degree(r) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + return q, r + + +def dmp_rr_div(f, g, u, K): + """ + Multivariate division with remainder over a ring. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_rr_div(x**2 + x*y, 2*x + 2) + (0, x**2 + x*y) + + """ + if not u: + return dup_rr_div(f, g, K) + + df = dmp_degree(f, u) + dg = dmp_degree(g, u) + + if dg < 0: + raise ZeroDivisionError("polynomial division") + + q, r, dr = dmp_zero(u), f, df + + if df < dg: + return q, r + + lc_g, v = dmp_LC(g, K), u - 1 + + while True: + lc_r = dmp_LC(r, K) + c, R = dmp_rr_div(lc_r, lc_g, v, K) + + if not dmp_zero_p(R, v): + break + + j = dr - dg + + q = dmp_add_term(q, c, j, u, K) + h = dmp_mul_term(g, c, j, u, K) + r = dmp_sub(r, h, u, K) + + _dr, dr = dr, dmp_degree(r, u) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + return q, r + + +def dup_ff_div(f, g, K): + """ + Polynomial division with remainder over a field. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> R.dup_ff_div(x**2 + 1, 2*x - 4) + (1/2*x + 1, 5) + + """ + df = dup_degree(f) + dg = dup_degree(g) + + q, r, dr = [], f, df + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return q, r + + lc_g = dup_LC(g, K) + + while True: + lc_r = dup_LC(r, K) + + c = K.exquo(lc_r, lc_g) + j = dr - dg + + q = dup_add_term(q, c, j, K) + h = dup_mul_term(g, c, j, K) + r = dup_sub(r, h, K) + + _dr, dr = dr, dup_degree(r) + + if dr < dg: + break + elif dr == _dr and not K.is_Exact: + # remove leading term created by rounding error + r = dup_strip(r[1:]) + dr = dup_degree(r) + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + return q, r + + +def dmp_ff_div(f, g, u, K): + """ + Polynomial division with remainder over a field. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> R.dmp_ff_div(x**2 + x*y, 2*x + 2) + (1/2*x + 1/2*y - 1/2, -y + 1) + + """ + if not u: + return dup_ff_div(f, g, K) + + df = dmp_degree(f, u) + dg = dmp_degree(g, u) + + if dg < 0: + raise ZeroDivisionError("polynomial division") + + q, r, dr = dmp_zero(u), f, df + + if df < dg: + return q, r + + lc_g, v = dmp_LC(g, K), u - 1 + + while True: + lc_r = dmp_LC(r, K) + c, R = dmp_ff_div(lc_r, lc_g, v, K) + + if not dmp_zero_p(R, v): + break + + j = dr - dg + + q = dmp_add_term(q, c, j, u, K) + h = dmp_mul_term(g, c, j, u, K) + r = dmp_sub(r, h, u, K) + + _dr, dr = dr, dmp_degree(r, u) + + if dr < dg: + break + elif not (dr < _dr): + raise PolynomialDivisionFailed(f, g, K) + + return q, r + + +def dup_div(f, g, K): + """ + Polynomial division with remainder in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> R.dup_div(x**2 + 1, 2*x - 4) + (0, x**2 + 1) + + >>> R, x = ring("x", QQ) + >>> R.dup_div(x**2 + 1, 2*x - 4) + (1/2*x + 1, 5) + + """ + if K.is_Field: + return dup_ff_div(f, g, K) + else: + return dup_rr_div(f, g, K) + + +def dup_rem(f, g, K): + """ + Returns polynomial remainder in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> R.dup_rem(x**2 + 1, 2*x - 4) + x**2 + 1 + + >>> R, x = ring("x", QQ) + >>> R.dup_rem(x**2 + 1, 2*x - 4) + 5 + + """ + return dup_div(f, g, K)[1] + + +def dup_quo(f, g, K): + """ + Returns exact polynomial quotient in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> R.dup_quo(x**2 + 1, 2*x - 4) + 0 + + >>> R, x = ring("x", QQ) + >>> R.dup_quo(x**2 + 1, 2*x - 4) + 1/2*x + 1 + + """ + return dup_div(f, g, K)[0] + + +def dup_exquo(f, g, K): + """ + Returns polynomial quotient in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_exquo(x**2 - 1, x - 1) + x + 1 + + >>> R.dup_exquo(x**2 + 1, 2*x - 4) + Traceback (most recent call last): + ... + ExactQuotientFailed: [2, -4] does not divide [1, 0, 1] + + """ + q, r = dup_div(f, g, K) + + if not r: + return q + else: + raise ExactQuotientFailed(f, g) + + +def dmp_div(f, g, u, K): + """ + Polynomial division with remainder in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> R.dmp_div(x**2 + x*y, 2*x + 2) + (0, x**2 + x*y) + + >>> R, x,y = ring("x,y", QQ) + >>> R.dmp_div(x**2 + x*y, 2*x + 2) + (1/2*x + 1/2*y - 1/2, -y + 1) + + """ + if K.is_Field: + return dmp_ff_div(f, g, u, K) + else: + return dmp_rr_div(f, g, u, K) + + +def dmp_rem(f, g, u, K): + """ + Returns polynomial remainder in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> R.dmp_rem(x**2 + x*y, 2*x + 2) + x**2 + x*y + + >>> R, x,y = ring("x,y", QQ) + >>> R.dmp_rem(x**2 + x*y, 2*x + 2) + -y + 1 + + """ + return dmp_div(f, g, u, K)[1] + + +def dmp_quo(f, g, u, K): + """ + Returns exact polynomial quotient in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> R.dmp_quo(x**2 + x*y, 2*x + 2) + 0 + + >>> R, x,y = ring("x,y", QQ) + >>> R.dmp_quo(x**2 + x*y, 2*x + 2) + 1/2*x + 1/2*y - 1/2 + + """ + return dmp_div(f, g, u, K)[0] + + +def dmp_exquo(f, g, u, K): + """ + Returns polynomial quotient in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**2 + x*y + >>> g = x + y + >>> h = 2*x + 2 + + >>> R.dmp_exquo(f, g) + x + + >>> R.dmp_exquo(f, h) + Traceback (most recent call last): + ... + ExactQuotientFailed: [[2], [2]] does not divide [[1], [1, 0], []] + + """ + q, r = dmp_div(f, g, u, K) + + if dmp_zero_p(r, u): + return q + else: + raise ExactQuotientFailed(f, g) + + +def dup_max_norm(f, K): + """ + Returns maximum norm of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_max_norm(-x**2 + 2*x - 3) + 3 + + """ + if not f: + return K.zero + else: + return max(dup_abs(f, K)) + + +def dmp_max_norm(f, u, K): + """ + Returns maximum norm of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_max_norm(2*x*y - x - 3) + 3 + + """ + if not u: + return dup_max_norm(f, K) + + v = u - 1 + + return max(dmp_max_norm(c, v, K) for c in f) + + +def dup_l1_norm(f, K): + """ + Returns l1 norm of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_l1_norm(2*x**3 - 3*x**2 + 1) + 6 + + """ + if not f: + return K.zero + else: + return sum(dup_abs(f, K)) + + +def dmp_l1_norm(f, u, K): + """ + Returns l1 norm of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_l1_norm(2*x*y - x - 3) + 6 + + """ + if not u: + return dup_l1_norm(f, K) + + v = u - 1 + + return sum(dmp_l1_norm(c, v, K) for c in f) + + +def dup_l2_norm_squared(f, K): + """ + Returns squared l2 norm of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_l2_norm_squared(2*x**3 - 3*x**2 + 1) + 14 + + """ + return sum([coeff**2 for coeff in f], K.zero) + + +def dmp_l2_norm_squared(f, u, K): + """ + Returns squared l2 norm of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_l2_norm_squared(2*x*y - x - 3) + 14 + + """ + if not u: + return dup_l2_norm_squared(f, K) + + v = u - 1 + + return sum(dmp_l2_norm_squared(c, v, K) for c in f) + + +def dup_expand(polys, K): + """ + Multiply together several polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_expand([x**2 - 1, x, 2]) + 2*x**3 - 2*x + + """ + if not polys: + return [K.one] + + f = polys[0] + + for g in polys[1:]: + f = dup_mul(f, g, K) + + return f + + +def dmp_expand(polys, u, K): + """ + Multiply together several polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_expand([x**2 + y**2, x + 1]) + x**3 + x**2 + x*y**2 + y**2 + + """ + if not polys: + return dmp_one(u, K) + + f = polys[0] + + for g in polys[1:]: + f = dmp_mul(f, g, u, K) + + return f diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densebasic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densebasic.py new file mode 100644 index 0000000000000000000000000000000000000000..b3a8a9497302b1af5bca20de100b7ae41e96b439 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densebasic.py @@ -0,0 +1,1887 @@ +"""Basic tools for dense recursive polynomials in ``K[x]`` or ``K[X]``. """ + + +from sympy.core import igcd +from sympy.polys.monomials import monomial_min, monomial_div +from sympy.polys.orderings import monomial_key + +import random + + +ninf = float('-inf') + + +def poly_LC(f, K): + """ + Return leading coefficient of ``f``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import poly_LC + + >>> poly_LC([], ZZ) + 0 + >>> poly_LC([ZZ(1), ZZ(2), ZZ(3)], ZZ) + 1 + + """ + if not f: + return K.zero + else: + return f[0] + + +def poly_TC(f, K): + """ + Return trailing coefficient of ``f``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import poly_TC + + >>> poly_TC([], ZZ) + 0 + >>> poly_TC([ZZ(1), ZZ(2), ZZ(3)], ZZ) + 3 + + """ + if not f: + return K.zero + else: + return f[-1] + +dup_LC = dmp_LC = poly_LC +dup_TC = dmp_TC = poly_TC + + +def dmp_ground_LC(f, u, K): + """ + Return the ground leading coefficient. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_ground_LC + + >>> f = ZZ.map([[[1], [2, 3]]]) + + >>> dmp_ground_LC(f, 2, ZZ) + 1 + + """ + while u: + f = dmp_LC(f, K) + u -= 1 + + return dup_LC(f, K) + + +def dmp_ground_TC(f, u, K): + """ + Return the ground trailing coefficient. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_ground_TC + + >>> f = ZZ.map([[[1], [2, 3]]]) + + >>> dmp_ground_TC(f, 2, ZZ) + 3 + + """ + while u: + f = dmp_TC(f, K) + u -= 1 + + return dup_TC(f, K) + + +def dmp_true_LT(f, u, K): + """ + Return the leading term ``c * x_1**n_1 ... x_k**n_k``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_true_LT + + >>> f = ZZ.map([[4], [2, 0], [3, 0, 0]]) + + >>> dmp_true_LT(f, 1, ZZ) + ((2, 0), 4) + + """ + monom = [] + + while u: + monom.append(len(f) - 1) + f, u = f[0], u - 1 + + if not f: + monom.append(0) + else: + monom.append(len(f) - 1) + + return tuple(monom), dup_LC(f, K) + + +def dup_degree(f): + """ + Return the leading degree of ``f`` in ``K[x]``. + + Note that the degree of 0 is negative infinity (``float('-inf')``). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_degree + + >>> f = ZZ.map([1, 2, 0, 3]) + + >>> dup_degree(f) + 3 + + """ + if not f: + return ninf + return len(f) - 1 + + +def dmp_degree(f, u): + """ + Return the leading degree of ``f`` in ``x_0`` in ``K[X]``. + + Note that the degree of 0 is negative infinity (``float('-inf')``). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_degree + + >>> dmp_degree([[[]]], 2) + -inf + + >>> f = ZZ.map([[2], [1, 2, 3]]) + + >>> dmp_degree(f, 1) + 1 + + """ + if dmp_zero_p(f, u): + return ninf + else: + return len(f) - 1 + + +def _rec_degree_in(g, v, i, j): + """Recursive helper function for :func:`dmp_degree_in`.""" + if i == j: + return dmp_degree(g, v) + + v, i = v - 1, i + 1 + + return max(_rec_degree_in(c, v, i, j) for c in g) + + +def dmp_degree_in(f, j, u): + """ + Return the leading degree of ``f`` in ``x_j`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_degree_in + + >>> f = ZZ.map([[2], [1, 2, 3]]) + + >>> dmp_degree_in(f, 0, 1) + 1 + >>> dmp_degree_in(f, 1, 1) + 2 + + """ + if not j: + return dmp_degree(f, u) + if j < 0 or j > u: + raise IndexError("0 <= j <= %s expected, got %s" % (u, j)) + + return _rec_degree_in(f, u, 0, j) + + +def _rec_degree_list(g, v, i, degs): + """Recursive helper for :func:`dmp_degree_list`.""" + degs[i] = max(degs[i], dmp_degree(g, v)) + + if v > 0: + v, i = v - 1, i + 1 + + for c in g: + _rec_degree_list(c, v, i, degs) + + +def dmp_degree_list(f, u): + """ + Return a list of degrees of ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_degree_list + + >>> f = ZZ.map([[1], [1, 2, 3]]) + + >>> dmp_degree_list(f, 1) + (1, 2) + + """ + degs = [ninf]*(u + 1) + _rec_degree_list(f, u, 0, degs) + return tuple(degs) + + +def dup_strip(f): + """ + Remove leading zeros from ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dup_strip + + >>> dup_strip([0, 0, 1, 2, 3, 0]) + [1, 2, 3, 0] + + """ + if not f or f[0]: + return f + + i = 0 + + for cf in f: + if cf: + break + else: + i += 1 + + return f[i:] + + +def dmp_strip(f, u): + """ + Remove leading zeros from ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_strip + + >>> dmp_strip([[], [0, 1, 2], [1]], 1) + [[0, 1, 2], [1]] + + """ + if not u: + return dup_strip(f) + + if dmp_zero_p(f, u): + return f + + i, v = 0, u - 1 + + for c in f: + if not dmp_zero_p(c, v): + break + else: + i += 1 + + if i == len(f): + return dmp_zero(u) + else: + return f[i:] + + +def _rec_validate(f, g, i, K): + """Recursive helper for :func:`dmp_validate`.""" + if not isinstance(g, list): + if K is not None and not K.of_type(g): + raise TypeError("%s in %s in not of type %s" % (g, f, K.dtype)) + + return {i - 1} + elif not g: + return {i} + else: + levels = set() + + for c in g: + levels |= _rec_validate(f, c, i + 1, K) + + return levels + + +def _rec_strip(g, v): + """Recursive helper for :func:`_rec_strip`.""" + if not v: + return dup_strip(g) + + w = v - 1 + + return dmp_strip([ _rec_strip(c, w) for c in g ], v) + + +def dmp_validate(f, K=None): + """ + Return the number of levels in ``f`` and recursively strip it. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_validate + + >>> dmp_validate([[], [0, 1, 2], [1]]) + ([[1, 2], [1]], 1) + + >>> dmp_validate([[1], 1]) + Traceback (most recent call last): + ... + ValueError: invalid data structure for a multivariate polynomial + + """ + levels = _rec_validate(f, f, 0, K) + + u = levels.pop() + + if not levels: + return _rec_strip(f, u), u + else: + raise ValueError( + "invalid data structure for a multivariate polynomial") + + +def dup_reverse(f): + """ + Compute ``x**n * f(1/x)``, i.e.: reverse ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_reverse + + >>> f = ZZ.map([1, 2, 3, 0]) + + >>> dup_reverse(f) + [3, 2, 1] + + """ + return dup_strip(list(reversed(f))) + + +def dup_copy(f): + """ + Create a new copy of a polynomial ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_copy + + >>> f = ZZ.map([1, 2, 3, 0]) + + >>> dup_copy([1, 2, 3, 0]) + [1, 2, 3, 0] + + """ + return list(f) + + +def dmp_copy(f, u): + """ + Create a new copy of a polynomial ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_copy + + >>> f = ZZ.map([[1], [1, 2]]) + + >>> dmp_copy(f, 1) + [[1], [1, 2]] + + """ + if not u: + return list(f) + + v = u - 1 + + return [ dmp_copy(c, v) for c in f ] + + +def dup_to_tuple(f): + """ + Convert `f` into a tuple. + + This is needed for hashing. This is similar to dup_copy(). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_copy + + >>> f = ZZ.map([1, 2, 3, 0]) + + >>> dup_copy([1, 2, 3, 0]) + [1, 2, 3, 0] + + """ + return tuple(f) + + +def dmp_to_tuple(f, u): + """ + Convert `f` into a nested tuple of tuples. + + This is needed for hashing. This is similar to dmp_copy(). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_to_tuple + + >>> f = ZZ.map([[1], [1, 2]]) + + >>> dmp_to_tuple(f, 1) + ((1,), (1, 2)) + + """ + if not u: + return tuple(f) + v = u - 1 + + return tuple(dmp_to_tuple(c, v) for c in f) + + +def dup_normal(f, K): + """ + Normalize univariate polynomial in the given domain. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_normal + + >>> dup_normal([0, 1, 2, 3], ZZ) + [1, 2, 3] + + """ + return dup_strip([ K.normal(c) for c in f ]) + + +def dmp_normal(f, u, K): + """ + Normalize a multivariate polynomial in the given domain. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_normal + + >>> dmp_normal([[], [0, 1, 2]], 1, ZZ) + [[1, 2]] + + """ + if not u: + return dup_normal(f, K) + + v = u - 1 + + return dmp_strip([ dmp_normal(c, v, K) for c in f ], u) + + +def dup_convert(f, K0, K1): + """ + Convert the ground domain of ``f`` from ``K0`` to ``K1``. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_convert + + >>> R, x = ring("x", ZZ) + + >>> dup_convert([R(1), R(2)], R.to_domain(), ZZ) + [1, 2] + >>> dup_convert([ZZ(1), ZZ(2)], ZZ, R.to_domain()) + [1, 2] + + """ + if K0 is not None and K0 == K1: + return f + else: + return dup_strip([ K1.convert(c, K0) for c in f ]) + + +def dmp_convert(f, u, K0, K1): + """ + Convert the ground domain of ``f`` from ``K0`` to ``K1``. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_convert + + >>> R, x = ring("x", ZZ) + + >>> dmp_convert([[R(1)], [R(2)]], 1, R.to_domain(), ZZ) + [[1], [2]] + >>> dmp_convert([[ZZ(1)], [ZZ(2)]], 1, ZZ, R.to_domain()) + [[1], [2]] + + """ + if not u: + return dup_convert(f, K0, K1) + if K0 is not None and K0 == K1: + return f + + v = u - 1 + + return dmp_strip([ dmp_convert(c, v, K0, K1) for c in f ], u) + + +def dup_from_sympy(f, K): + """ + Convert the ground domain of ``f`` from SymPy to ``K``. + + Examples + ======== + + >>> from sympy import S + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_from_sympy + + >>> dup_from_sympy([S(1), S(2)], ZZ) == [ZZ(1), ZZ(2)] + True + + """ + return dup_strip([ K.from_sympy(c) for c in f ]) + + +def dmp_from_sympy(f, u, K): + """ + Convert the ground domain of ``f`` from SymPy to ``K``. + + Examples + ======== + + >>> from sympy import S + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_from_sympy + + >>> dmp_from_sympy([[S(1)], [S(2)]], 1, ZZ) == [[ZZ(1)], [ZZ(2)]] + True + + """ + if not u: + return dup_from_sympy(f, K) + + v = u - 1 + + return dmp_strip([ dmp_from_sympy(c, v, K) for c in f ], u) + + +def dup_nth(f, n, K): + """ + Return the ``n``-th coefficient of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_nth + + >>> f = ZZ.map([1, 2, 3]) + + >>> dup_nth(f, 0, ZZ) + 3 + >>> dup_nth(f, 4, ZZ) + 0 + + """ + if n < 0: + raise IndexError("'n' must be non-negative, got %i" % n) + elif n >= len(f): + return K.zero + else: + return f[dup_degree(f) - n] + + +def dmp_nth(f, n, u, K): + """ + Return the ``n``-th coefficient of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_nth + + >>> f = ZZ.map([[1], [2], [3]]) + + >>> dmp_nth(f, 0, 1, ZZ) + [3] + >>> dmp_nth(f, 4, 1, ZZ) + [] + + """ + if n < 0: + raise IndexError("'n' must be non-negative, got %i" % n) + elif n >= len(f): + return dmp_zero(u - 1) + else: + return f[dmp_degree(f, u) - n] + + +def dmp_ground_nth(f, N, u, K): + """ + Return the ground ``n``-th coefficient of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_ground_nth + + >>> f = ZZ.map([[1], [2, 3]]) + + >>> dmp_ground_nth(f, (0, 1), 1, ZZ) + 2 + + """ + v = u + + for n in N: + if n < 0: + raise IndexError("`n` must be non-negative, got %i" % n) + elif n >= len(f): + return K.zero + else: + d = dmp_degree(f, v) + if d == ninf: + d = -1 + f, v = f[d - n], v - 1 + + return f + + +def dmp_zero_p(f, u): + """ + Return ``True`` if ``f`` is zero in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_zero_p + + >>> dmp_zero_p([[[[[]]]]], 4) + True + >>> dmp_zero_p([[[[[1]]]]], 4) + False + + """ + while u: + if len(f) != 1: + return False + + f = f[0] + u -= 1 + + return not f + + +def dmp_zero(u): + """ + Return a multivariate zero. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_zero + + >>> dmp_zero(4) + [[[[[]]]]] + + """ + r = [] + + for i in range(u): + r = [r] + + return r + + +def dmp_one_p(f, u, K): + """ + Return ``True`` if ``f`` is one in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_one_p + + >>> dmp_one_p([[[ZZ(1)]]], 2, ZZ) + True + + """ + return dmp_ground_p(f, K.one, u) + + +def dmp_one(u, K): + """ + Return a multivariate one over ``K``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_one + + >>> dmp_one(2, ZZ) + [[[1]]] + + """ + return dmp_ground(K.one, u) + + +def dmp_ground_p(f, c, u): + """ + Return True if ``f`` is constant in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_ground_p + + >>> dmp_ground_p([[[3]]], 3, 2) + True + >>> dmp_ground_p([[[4]]], None, 2) + True + + """ + if c is not None and not c: + return dmp_zero_p(f, u) + + while u: + if len(f) != 1: + return False + f = f[0] + u -= 1 + + if c is None: + return len(f) <= 1 + else: + return f == [c] + + +def dmp_ground(c, u): + """ + Return a multivariate constant. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_ground + + >>> dmp_ground(3, 5) + [[[[[[3]]]]]] + >>> dmp_ground(1, -1) + 1 + + """ + if not c: + return dmp_zero(u) + + for i in range(u + 1): + c = [c] + + return c + + +def dmp_zeros(n, u, K): + """ + Return a list of multivariate zeros. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_zeros + + >>> dmp_zeros(3, 2, ZZ) + [[[[]]], [[[]]], [[[]]]] + >>> dmp_zeros(3, -1, ZZ) + [0, 0, 0] + + """ + if not n: + return [] + + if u < 0: + return [K.zero]*n + else: + return [ dmp_zero(u) for i in range(n) ] + + +def dmp_grounds(c, n, u): + """ + Return a list of multivariate constants. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_grounds + + >>> dmp_grounds(ZZ(4), 3, 2) + [[[[4]]], [[[4]]], [[[4]]]] + >>> dmp_grounds(ZZ(4), 3, -1) + [4, 4, 4] + + """ + if not n: + return [] + + if u < 0: + return [c]*n + else: + return [ dmp_ground(c, u) for i in range(n) ] + + +def dmp_negative_p(f, u, K): + """ + Return ``True`` if ``LC(f)`` is negative. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_negative_p + + >>> dmp_negative_p([[ZZ(1)], [-ZZ(1)]], 1, ZZ) + False + >>> dmp_negative_p([[-ZZ(1)], [ZZ(1)]], 1, ZZ) + True + + """ + return K.is_negative(dmp_ground_LC(f, u, K)) + + +def dmp_positive_p(f, u, K): + """ + Return ``True`` if ``LC(f)`` is positive. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_positive_p + + >>> dmp_positive_p([[ZZ(1)], [-ZZ(1)]], 1, ZZ) + True + >>> dmp_positive_p([[-ZZ(1)], [ZZ(1)]], 1, ZZ) + False + + """ + return K.is_positive(dmp_ground_LC(f, u, K)) + + +def dup_from_dict(f, K): + """ + Create a ``K[x]`` polynomial from a ``dict``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_from_dict + + >>> dup_from_dict({(0,): ZZ(7), (2,): ZZ(5), (4,): ZZ(1)}, ZZ) + [1, 0, 5, 0, 7] + >>> dup_from_dict({}, ZZ) + [] + + """ + if not f: + return [] + + n, h = max(f.keys()), [] + + if isinstance(n, int): + for k in range(n, -1, -1): + h.append(f.get(k, K.zero)) + else: + (n,) = n + + for k in range(n, -1, -1): + h.append(f.get((k,), K.zero)) + + return dup_strip(h) + + +def dup_from_raw_dict(f, K): + """ + Create a ``K[x]`` polynomial from a raw ``dict``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_from_raw_dict + + >>> dup_from_raw_dict({0: ZZ(7), 2: ZZ(5), 4: ZZ(1)}, ZZ) + [1, 0, 5, 0, 7] + + """ + if not f: + return [] + + n, h = max(f.keys()), [] + + for k in range(n, -1, -1): + h.append(f.get(k, K.zero)) + + return dup_strip(h) + + +def dmp_from_dict(f, u, K): + """ + Create a ``K[X]`` polynomial from a ``dict``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_from_dict + + >>> dmp_from_dict({(0, 0): ZZ(3), (0, 1): ZZ(2), (2, 1): ZZ(1)}, 1, ZZ) + [[1, 0], [], [2, 3]] + >>> dmp_from_dict({}, 0, ZZ) + [] + + """ + if not u: + return dup_from_dict(f, K) + if not f: + return dmp_zero(u) + + coeffs = {} + + for monom, coeff in f.items(): + head, tail = monom[0], monom[1:] + + if head in coeffs: + coeffs[head][tail] = coeff + else: + coeffs[head] = { tail: coeff } + + n, v, h = max(coeffs.keys()), u - 1, [] + + for k in range(n, -1, -1): + coeff = coeffs.get(k) + + if coeff is not None: + h.append(dmp_from_dict(coeff, v, K)) + else: + h.append(dmp_zero(v)) + + return dmp_strip(h, u) + + +def dup_to_dict(f, K=None, zero=False): + """ + Convert ``K[x]`` polynomial to a ``dict``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dup_to_dict + + >>> dup_to_dict([1, 0, 5, 0, 7]) + {(0,): 7, (2,): 5, (4,): 1} + >>> dup_to_dict([]) + {} + + """ + if not f and zero: + return {(0,): K.zero} + + n, result = len(f) - 1, {} + + for k in range(0, n + 1): + if f[n - k]: + result[(k,)] = f[n - k] + + return result + + +def dup_to_raw_dict(f, K=None, zero=False): + """ + Convert a ``K[x]`` polynomial to a raw ``dict``. + + Examples + ======== + + >>> from sympy.polys.densebasic import dup_to_raw_dict + + >>> dup_to_raw_dict([1, 0, 5, 0, 7]) + {0: 7, 2: 5, 4: 1} + + """ + if not f and zero: + return {0: K.zero} + + n, result = len(f) - 1, {} + + for k in range(0, n + 1): + if f[n - k]: + result[k] = f[n - k] + + return result + + +def dmp_to_dict(f, u, K=None, zero=False): + """ + Convert a ``K[X]`` polynomial to a ``dict````. + + Examples + ======== + + >>> from sympy.polys.densebasic import dmp_to_dict + + >>> dmp_to_dict([[1, 0], [], [2, 3]], 1) + {(0, 0): 3, (0, 1): 2, (2, 1): 1} + >>> dmp_to_dict([], 0) + {} + + """ + if not u: + return dup_to_dict(f, K, zero=zero) + + if dmp_zero_p(f, u) and zero: + return {(0,)*(u + 1): K.zero} + + n, v, result = dmp_degree(f, u), u - 1, {} + + if n == ninf: + n = -1 + + for k in range(0, n + 1): + h = dmp_to_dict(f[n - k], v) + + for exp, coeff in h.items(): + result[(k,) + exp] = coeff + + return result + + +def dmp_swap(f, i, j, u, K): + """ + Transform ``K[..x_i..x_j..]`` to ``K[..x_j..x_i..]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_swap + + >>> f = ZZ.map([[[2], [1, 0]], []]) + + >>> dmp_swap(f, 0, 1, 2, ZZ) + [[[2], []], [[1, 0], []]] + >>> dmp_swap(f, 1, 2, 2, ZZ) + [[[1], [2, 0]], [[]]] + >>> dmp_swap(f, 0, 2, 2, ZZ) + [[[1, 0]], [[2, 0], []]] + + """ + if i < 0 or j < 0 or i > u or j > u: + raise IndexError("0 <= i < j <= %s expected" % u) + elif i == j: + return f + + F, H = dmp_to_dict(f, u), {} + + for exp, coeff in F.items(): + H[exp[:i] + (exp[j],) + + exp[i + 1:j] + + (exp[i],) + exp[j + 1:]] = coeff + + return dmp_from_dict(H, u, K) + + +def dmp_permute(f, P, u, K): + """ + Return a polynomial in ``K[x_{P(1)},..,x_{P(n)}]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_permute + + >>> f = ZZ.map([[[2], [1, 0]], []]) + + >>> dmp_permute(f, [1, 0, 2], 2, ZZ) + [[[2], []], [[1, 0], []]] + >>> dmp_permute(f, [1, 2, 0], 2, ZZ) + [[[1], []], [[2, 0], []]] + + """ + F, H = dmp_to_dict(f, u), {} + + for exp, coeff in F.items(): + new_exp = [0]*len(exp) + + for e, p in zip(exp, P): + new_exp[p] = e + + H[tuple(new_exp)] = coeff + + return dmp_from_dict(H, u, K) + + +def dmp_nest(f, l, K): + """ + Return a multivariate value nested ``l``-levels. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_nest + + >>> dmp_nest([[ZZ(1)]], 2, ZZ) + [[[[1]]]] + + """ + if not isinstance(f, list): + return dmp_ground(f, l) + + for i in range(l): + f = [f] + + return f + + +def dmp_raise(f, l, u, K): + """ + Return a multivariate polynomial raised ``l``-levels. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_raise + + >>> f = ZZ.map([[], [1, 2]]) + + >>> dmp_raise(f, 2, 1, ZZ) + [[[[]]], [[[1]], [[2]]]] + + """ + if not l: + return f + + if not u: + if not f: + return dmp_zero(l) + + k = l - 1 + + return [ dmp_ground(c, k) for c in f ] + + v = u - 1 + + return [ dmp_raise(c, l, v, K) for c in f ] + + +def dup_deflate(f, K): + """ + Map ``x**m`` to ``y`` in a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_deflate + + >>> f = ZZ.map([1, 0, 0, 1, 0, 0, 1]) + + >>> dup_deflate(f, ZZ) + (3, [1, 1, 1]) + + """ + if dup_degree(f) <= 0: + return 1, f + + g = 0 + + for i in range(len(f)): + if not f[-i - 1]: + continue + + g = igcd(g, i) + + if g == 1: + return 1, f + + return g, f[::g] + + +def dmp_deflate(f, u, K): + """ + Map ``x_i**m_i`` to ``y_i`` in a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_deflate + + >>> f = ZZ.map([[1, 0, 0, 2], [], [3, 0, 0, 4]]) + + >>> dmp_deflate(f, 1, ZZ) + ((2, 3), [[1, 2], [3, 4]]) + + """ + if dmp_zero_p(f, u): + return (1,)*(u + 1), f + + F = dmp_to_dict(f, u) + B = [0]*(u + 1) + + for M in F.keys(): + for i, m in enumerate(M): + B[i] = igcd(B[i], m) + + for i, b in enumerate(B): + if not b: + B[i] = 1 + + B = tuple(B) + + if all(b == 1 for b in B): + return B, f + + H = {} + + for A, coeff in F.items(): + N = [ a // b for a, b in zip(A, B) ] + H[tuple(N)] = coeff + + return B, dmp_from_dict(H, u, K) + + +def dup_multi_deflate(polys, K): + """ + Map ``x**m`` to ``y`` in a set of polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_multi_deflate + + >>> f = ZZ.map([1, 0, 2, 0, 3]) + >>> g = ZZ.map([4, 0, 0]) + + >>> dup_multi_deflate((f, g), ZZ) + (2, ([1, 2, 3], [4, 0])) + + """ + G = 0 + + for p in polys: + if dup_degree(p) <= 0: + return 1, polys + + g = 0 + + for i in range(len(p)): + if not p[-i - 1]: + continue + + g = igcd(g, i) + + if g == 1: + return 1, polys + + G = igcd(G, g) + + return G, tuple([ p[::G] for p in polys ]) + + +def dmp_multi_deflate(polys, u, K): + """ + Map ``x_i**m_i`` to ``y_i`` in a set of polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_multi_deflate + + >>> f = ZZ.map([[1, 0, 0, 2], [], [3, 0, 0, 4]]) + >>> g = ZZ.map([[1, 0, 2], [], [3, 0, 4]]) + + >>> dmp_multi_deflate((f, g), 1, ZZ) + ((2, 1), ([[1, 0, 0, 2], [3, 0, 0, 4]], [[1, 0, 2], [3, 0, 4]])) + + """ + if not u: + M, H = dup_multi_deflate(polys, K) + return (M,), H + + F, B = [], [0]*(u + 1) + + for p in polys: + f = dmp_to_dict(p, u) + + if not dmp_zero_p(p, u): + for M in f.keys(): + for i, m in enumerate(M): + B[i] = igcd(B[i], m) + + F.append(f) + + for i, b in enumerate(B): + if not b: + B[i] = 1 + + B = tuple(B) + + if all(b == 1 for b in B): + return B, polys + + H = [] + + for f in F: + h = {} + + for A, coeff in f.items(): + N = [ a // b for a, b in zip(A, B) ] + h[tuple(N)] = coeff + + H.append(dmp_from_dict(h, u, K)) + + return B, tuple(H) + + +def dup_inflate(f, m, K): + """ + Map ``y`` to ``x**m`` in a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_inflate + + >>> f = ZZ.map([1, 1, 1]) + + >>> dup_inflate(f, 3, ZZ) + [1, 0, 0, 1, 0, 0, 1] + + """ + if m <= 0: + raise IndexError("'m' must be positive, got %s" % m) + if m == 1 or not f: + return f + + result = [f[0]] + + for coeff in f[1:]: + result.extend([K.zero]*(m - 1)) + result.append(coeff) + + return result + + +def _rec_inflate(g, M, v, i, K): + """Recursive helper for :func:`dmp_inflate`.""" + if not v: + return dup_inflate(g, M[i], K) + if M[i] <= 0: + raise IndexError("all M[i] must be positive, got %s" % M[i]) + + w, j = v - 1, i + 1 + + g = [ _rec_inflate(c, M, w, j, K) for c in g ] + + result = [g[0]] + + for coeff in g[1:]: + for _ in range(1, M[i]): + result.append(dmp_zero(w)) + + result.append(coeff) + + return result + + +def dmp_inflate(f, M, u, K): + """ + Map ``y_i`` to ``x_i**k_i`` in a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_inflate + + >>> f = ZZ.map([[1, 2], [3, 4]]) + + >>> dmp_inflate(f, (2, 3), 1, ZZ) + [[1, 0, 0, 2], [], [3, 0, 0, 4]] + + """ + if not u: + return dup_inflate(f, M[0], K) + + if all(m == 1 for m in M): + return f + else: + return _rec_inflate(f, M, u, 0, K) + + +def dmp_exclude(f, u, K): + """ + Exclude useless levels from ``f``. + + Return the levels excluded, the new excluded ``f``, and the new ``u``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_exclude + + >>> f = ZZ.map([[[1]], [[1], [2]]]) + + >>> dmp_exclude(f, 2, ZZ) + ([2], [[1], [1, 2]], 1) + + """ + if not u or dmp_ground_p(f, None, u): + return [], f, u + + J, F = [], dmp_to_dict(f, u) + + for j in range(0, u + 1): + for monom in F.keys(): + if monom[j]: + break + else: + J.append(j) + + if not J: + return [], f, u + + f = {} + + for monom, coeff in F.items(): + monom = list(monom) + + for j in reversed(J): + del monom[j] + + f[tuple(monom)] = coeff + + u -= len(J) + + return J, dmp_from_dict(f, u, K), u + + +def dmp_include(f, J, u, K): + """ + Include useless levels in ``f``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_include + + >>> f = ZZ.map([[1], [1, 2]]) + + >>> dmp_include(f, [2], 1, ZZ) + [[[1]], [[1], [2]]] + + """ + if not J: + return f + + F, f = dmp_to_dict(f, u), {} + + for monom, coeff in F.items(): + monom = list(monom) + + for j in J: + monom.insert(j, 0) + + f[tuple(monom)] = coeff + + u += len(J) + + return dmp_from_dict(f, u, K) + + +def dmp_inject(f, u, K, front=False): + """ + Convert ``f`` from ``K[X][Y]`` to ``K[X,Y]``. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_inject + + >>> R, x,y = ring("x,y", ZZ) + + >>> dmp_inject([R(1), x + 2], 0, R.to_domain()) + ([[[1]], [[1], [2]]], 2) + >>> dmp_inject([R(1), x + 2], 0, R.to_domain(), front=True) + ([[[1]], [[1, 2]]], 2) + + """ + f, h = dmp_to_dict(f, u), {} + + v = K.ngens - 1 + + for f_monom, g in f.items(): + g = g.to_dict() + + for g_monom, c in g.items(): + if front: + h[g_monom + f_monom] = c + else: + h[f_monom + g_monom] = c + + w = u + v + 1 + + return dmp_from_dict(h, w, K.dom), w + + +def dmp_eject(f, u, K, front=False): + """ + Convert ``f`` from ``K[X,Y]`` to ``K[X][Y]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_eject + + >>> dmp_eject([[[1]], [[1], [2]]], 2, ZZ['x', 'y']) + [1, x + 2] + + """ + f, h = dmp_to_dict(f, u), {} + + n = K.ngens + v = u - K.ngens + 1 + + for monom, c in f.items(): + if front: + g_monom, f_monom = monom[:n], monom[n:] + else: + g_monom, f_monom = monom[-n:], monom[:-n] + + if f_monom in h: + h[f_monom][g_monom] = c + else: + h[f_monom] = {g_monom: c} + + for monom, c in h.items(): + h[monom] = K(c) + + return dmp_from_dict(h, v - 1, K) + + +def dup_terms_gcd(f, K): + """ + Remove GCD of terms from ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_terms_gcd + + >>> f = ZZ.map([1, 0, 1, 0, 0]) + + >>> dup_terms_gcd(f, ZZ) + (2, [1, 0, 1]) + + """ + if dup_TC(f, K) or not f: + return 0, f + + i = 0 + + for c in reversed(f): + if not c: + i += 1 + else: + break + + return i, f[:-i] + + +def dmp_terms_gcd(f, u, K): + """ + Remove GCD of terms from ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_terms_gcd + + >>> f = ZZ.map([[1, 0], [1, 0, 0], [], []]) + + >>> dmp_terms_gcd(f, 1, ZZ) + ((2, 1), [[1], [1, 0]]) + + """ + if dmp_ground_TC(f, u, K) or dmp_zero_p(f, u): + return (0,)*(u + 1), f + + F = dmp_to_dict(f, u) + G = monomial_min(*list(F.keys())) + + if all(g == 0 for g in G): + return G, f + + f = {} + + for monom, coeff in F.items(): + f[monomial_div(monom, G)] = coeff + + return G, dmp_from_dict(f, u, K) + + +def _rec_list_terms(g, v, monom): + """Recursive helper for :func:`dmp_list_terms`.""" + d, terms = dmp_degree(g, v), [] + + if not v: + for i, c in enumerate(g): + if not c: + continue + + terms.append((monom + (d - i,), c)) + else: + w = v - 1 + + for i, c in enumerate(g): + terms.extend(_rec_list_terms(c, w, monom + (d - i,))) + + return terms + + +def dmp_list_terms(f, u, K, order=None): + """ + List all non-zero terms from ``f`` in the given order ``order``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_list_terms + + >>> f = ZZ.map([[1, 1], [2, 3]]) + + >>> dmp_list_terms(f, 1, ZZ) + [((1, 1), 1), ((1, 0), 1), ((0, 1), 2), ((0, 0), 3)] + >>> dmp_list_terms(f, 1, ZZ, order='grevlex') + [((1, 1), 1), ((1, 0), 1), ((0, 1), 2), ((0, 0), 3)] + + """ + def sort(terms, O): + return sorted(terms, key=lambda term: O(term[0]), reverse=True) + + terms = _rec_list_terms(f, u, ()) + + if not terms: + return [((0,)*(u + 1), K.zero)] + + if order is None: + return terms + else: + return sort(terms, monomial_key(order)) + + +def dup_apply_pairs(f, g, h, args, K): + """ + Apply ``h`` to pairs of coefficients of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_apply_pairs + + >>> h = lambda x, y, z: 2*x + y - z + + >>> dup_apply_pairs([1, 2, 3], [3, 2, 1], h, (1,), ZZ) + [4, 5, 6] + + """ + n, m = len(f), len(g) + + if n != m: + if n > m: + g = [K.zero]*(n - m) + g + else: + f = [K.zero]*(m - n) + f + + result = [] + + for a, b in zip(f, g): + result.append(h(a, b, *args)) + + return dup_strip(result) + + +def dmp_apply_pairs(f, g, h, args, u, K): + """ + Apply ``h`` to pairs of coefficients of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dmp_apply_pairs + + >>> h = lambda x, y, z: 2*x + y - z + + >>> dmp_apply_pairs([[1], [2, 3]], [[3], [2, 1]], h, (1,), 1, ZZ) + [[4], [5, 6]] + + """ + if not u: + return dup_apply_pairs(f, g, h, args, K) + + n, m, v = len(f), len(g), u - 1 + + if n != m: + if n > m: + g = dmp_zeros(n - m, v, K) + g + else: + f = dmp_zeros(m - n, v, K) + f + + result = [] + + for a, b in zip(f, g): + result.append(dmp_apply_pairs(a, b, h, args, v, K)) + + return dmp_strip(result, u) + + +def dup_slice(f, m, n, K): + """Take a continuous subsequence of terms of ``f`` in ``K[x]``. """ + k = len(f) + + if k >= m: + M = k - m + else: + M = 0 + if k >= n: + N = k - n + else: + N = 0 + + f = f[N:M] + + while f and f[0] == K.zero: + f.pop(0) + + if not f: + return [] + else: + return f + [K.zero]*m + + +def dmp_slice(f, m, n, u, K): + """Take a continuous subsequence of terms of ``f`` in ``K[X]``. """ + return dmp_slice_in(f, m, n, 0, u, K) + + +def dmp_slice_in(f, m, n, j, u, K): + """Take a continuous subsequence of terms of ``f`` in ``x_j`` in ``K[X]``. """ + if j < 0 or j > u: + raise IndexError("-%s <= j < %s expected, got %s" % (u, u, j)) + + if not u: + return dup_slice(f, m, n, K) + + f, g = dmp_to_dict(f, u), {} + + for monom, coeff in f.items(): + k = monom[j] + + if k < m or k >= n: + monom = monom[:j] + (0,) + monom[j + 1:] + + if monom in g: + g[monom] += coeff + else: + g[monom] = coeff + + return dmp_from_dict(g, u, K) + + +def dup_random(n, a, b, K): + """ + Return a polynomial of degree ``n`` with coefficients in ``[a, b]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.densebasic import dup_random + + >>> dup_random(3, -10, 10, ZZ) #doctest: +SKIP + [-2, -8, 9, -4] + + """ + f = [ K.convert(random.randint(a, b)) for _ in range(0, n + 1) ] + + while not f[0]: + f[0] = K.convert(random.randint(a, b)) + + return f diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densetools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densetools.py new file mode 100644 index 0000000000000000000000000000000000000000..122bf778a4843847be6db17708887416ba458f49 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/densetools.py @@ -0,0 +1,1438 @@ +"""Advanced tools for dense recursive polynomials in ``K[x]`` or ``K[X]``. """ + + +from sympy.polys.densearith import ( + dup_add_term, dmp_add_term, + dup_lshift, + dup_add, dmp_add, + dup_sub, dmp_sub, + dup_mul, dmp_mul, + dup_sqr, + dup_div, + dup_rem, dmp_rem, + dup_mul_ground, dmp_mul_ground, + dup_quo_ground, dmp_quo_ground, + dup_exquo_ground, dmp_exquo_ground, +) +from sympy.polys.densebasic import ( + dup_strip, dmp_strip, + dup_convert, dmp_convert, + dup_degree, dmp_degree, + dmp_to_dict, + dmp_from_dict, + dup_LC, dmp_LC, dmp_ground_LC, + dup_TC, dmp_TC, + dmp_zero, dmp_ground, + dmp_zero_p, + dup_to_raw_dict, dup_from_raw_dict, + dmp_zeros, + dmp_include, +) +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + DomainError +) + +from math import ceil as _ceil, log2 as _log2 + + +def dup_integrate(f, m, K): + """ + Computes the indefinite integral of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> R.dup_integrate(x**2 + 2*x, 1) + 1/3*x**3 + x**2 + >>> R.dup_integrate(x**2 + 2*x, 2) + 1/12*x**4 + 1/3*x**3 + + """ + if m <= 0 or not f: + return f + + g = [K.zero]*m + + for i, c in enumerate(reversed(f)): + n = i + 1 + + for j in range(1, m): + n *= i + j + 1 + + g.insert(0, K.exquo(c, K(n))) + + return g + + +def dmp_integrate(f, m, u, K): + """ + Computes the indefinite integral of ``f`` in ``x_0`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> R.dmp_integrate(x + 2*y, 1) + 1/2*x**2 + 2*x*y + >>> R.dmp_integrate(x + 2*y, 2) + 1/6*x**3 + x**2*y + + """ + if not u: + return dup_integrate(f, m, K) + + if m <= 0 or dmp_zero_p(f, u): + return f + + g, v = dmp_zeros(m, u - 1, K), u - 1 + + for i, c in enumerate(reversed(f)): + n = i + 1 + + for j in range(1, m): + n *= i + j + 1 + + g.insert(0, dmp_quo_ground(c, K(n), v, K)) + + return g + + +def _rec_integrate_in(g, m, v, i, j, K): + """Recursive helper for :func:`dmp_integrate_in`.""" + if i == j: + return dmp_integrate(g, m, v, K) + + w, i = v - 1, i + 1 + + return dmp_strip([ _rec_integrate_in(c, m, w, i, j, K) for c in g ], v) + + +def dmp_integrate_in(f, m, j, u, K): + """ + Computes the indefinite integral of ``f`` in ``x_j`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> R.dmp_integrate_in(x + 2*y, 1, 0) + 1/2*x**2 + 2*x*y + >>> R.dmp_integrate_in(x + 2*y, 1, 1) + x*y + y**2 + + """ + if j < 0 or j > u: + raise IndexError("0 <= j <= u expected, got u = %d, j = %d" % (u, j)) + + return _rec_integrate_in(f, m, u, 0, j, K) + + +def dup_diff(f, m, K): + """ + ``m``-th order derivative of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_diff(x**3 + 2*x**2 + 3*x + 4, 1) + 3*x**2 + 4*x + 3 + >>> R.dup_diff(x**3 + 2*x**2 + 3*x + 4, 2) + 6*x + 4 + + """ + if m <= 0: + return f + + n = dup_degree(f) + + if n < m: + return [] + + deriv = [] + + if m == 1: + for coeff in f[:-m]: + deriv.append(K(n)*coeff) + n -= 1 + else: + for coeff in f[:-m]: + k = n + + for i in range(n - 1, n - m, -1): + k *= i + + deriv.append(K(k)*coeff) + n -= 1 + + return dup_strip(deriv) + + +def dmp_diff(f, m, u, K): + """ + ``m``-th order derivative in ``x_0`` of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1 + + >>> R.dmp_diff(f, 1) + y**2 + 2*y + 3 + >>> R.dmp_diff(f, 2) + 0 + + """ + if not u: + return dup_diff(f, m, K) + if m <= 0: + return f + + n = dmp_degree(f, u) + + if n < m: + return dmp_zero(u) + + deriv, v = [], u - 1 + + if m == 1: + for coeff in f[:-m]: + deriv.append(dmp_mul_ground(coeff, K(n), v, K)) + n -= 1 + else: + for coeff in f[:-m]: + k = n + + for i in range(n - 1, n - m, -1): + k *= i + + deriv.append(dmp_mul_ground(coeff, K(k), v, K)) + n -= 1 + + return dmp_strip(deriv, u) + + +def _rec_diff_in(g, m, v, i, j, K): + """Recursive helper for :func:`dmp_diff_in`.""" + if i == j: + return dmp_diff(g, m, v, K) + + w, i = v - 1, i + 1 + + return dmp_strip([ _rec_diff_in(c, m, w, i, j, K) for c in g ], v) + + +def dmp_diff_in(f, m, j, u, K): + """ + ``m``-th order derivative in ``x_j`` of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1 + + >>> R.dmp_diff_in(f, 1, 0) + y**2 + 2*y + 3 + >>> R.dmp_diff_in(f, 1, 1) + 2*x*y + 2*x + 4*y + 3 + + """ + if j < 0 or j > u: + raise IndexError("0 <= j <= %s expected, got %s" % (u, j)) + + return _rec_diff_in(f, m, u, 0, j, K) + + +def dup_eval(f, a, K): + """ + Evaluate a polynomial at ``x = a`` in ``K[x]`` using Horner scheme. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_eval(x**2 + 2*x + 3, 2) + 11 + + """ + if not a: + return K.convert(dup_TC(f, K)) + + result = K.zero + + for c in f: + result *= a + result += c + + return result + + +def dmp_eval(f, a, u, K): + """ + Evaluate a polynomial at ``x_0 = a`` in ``K[X]`` using the Horner scheme. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_eval(2*x*y + 3*x + y + 2, 2) + 5*y + 8 + + """ + if not u: + return dup_eval(f, a, K) + + if not a: + return dmp_TC(f, K) + + result, v = dmp_LC(f, K), u - 1 + + for coeff in f[1:]: + result = dmp_mul_ground(result, a, v, K) + result = dmp_add(result, coeff, v, K) + + return result + + +def _rec_eval_in(g, a, v, i, j, K): + """Recursive helper for :func:`dmp_eval_in`.""" + if i == j: + return dmp_eval(g, a, v, K) + + v, i = v - 1, i + 1 + + return dmp_strip([ _rec_eval_in(c, a, v, i, j, K) for c in g ], v) + + +def dmp_eval_in(f, a, j, u, K): + """ + Evaluate a polynomial at ``x_j = a`` in ``K[X]`` using the Horner scheme. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 2*x*y + 3*x + y + 2 + + >>> R.dmp_eval_in(f, 2, 0) + 5*y + 8 + >>> R.dmp_eval_in(f, 2, 1) + 7*x + 4 + + """ + if j < 0 or j > u: + raise IndexError("0 <= j <= %s expected, got %s" % (u, j)) + + return _rec_eval_in(f, a, u, 0, j, K) + + +def _rec_eval_tail(g, i, A, u, K): + """Recursive helper for :func:`dmp_eval_tail`.""" + if i == u: + return dup_eval(g, A[-1], K) + else: + h = [ _rec_eval_tail(c, i + 1, A, u, K) for c in g ] + + if i < u - len(A) + 1: + return h + else: + return dup_eval(h, A[-u + i - 1], K) + + +def dmp_eval_tail(f, A, u, K): + """ + Evaluate a polynomial at ``x_j = a_j, ...`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 2*x*y + 3*x + y + 2 + + >>> R.dmp_eval_tail(f, [2]) + 7*x + 4 + >>> R.dmp_eval_tail(f, [2, 2]) + 18 + + """ + if not A: + return f + + if dmp_zero_p(f, u): + return dmp_zero(u - len(A)) + + e = _rec_eval_tail(f, 0, A, u, K) + + if u == len(A) - 1: + return e + else: + return dmp_strip(e, u - len(A)) + + +def _rec_diff_eval(g, m, a, v, i, j, K): + """Recursive helper for :func:`dmp_diff_eval`.""" + if i == j: + return dmp_eval(dmp_diff(g, m, v, K), a, v, K) + + v, i = v - 1, i + 1 + + return dmp_strip([ _rec_diff_eval(c, m, a, v, i, j, K) for c in g ], v) + + +def dmp_diff_eval_in(f, m, a, j, u, K): + """ + Differentiate and evaluate a polynomial in ``x_j`` at ``a`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1 + + >>> R.dmp_diff_eval_in(f, 1, 2, 0) + y**2 + 2*y + 3 + >>> R.dmp_diff_eval_in(f, 1, 2, 1) + 6*x + 11 + + """ + if j > u: + raise IndexError("-%s <= j < %s expected, got %s" % (u, u, j)) + if not j: + return dmp_eval(dmp_diff(f, m, u, K), a, u, K) + + return _rec_diff_eval(f, m, a, u, 0, j, K) + + +def dup_trunc(f, p, K): + """ + Reduce a ``K[x]`` polynomial modulo a constant ``p`` in ``K``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_trunc(2*x**3 + 3*x**2 + 5*x + 7, ZZ(3)) + -x**3 - x + 1 + + """ + if K.is_ZZ: + g = [] + + for c in f: + c = c % p + + if c > p // 2: + g.append(c - p) + else: + g.append(c) + elif K.is_FiniteField: + # XXX: python-flint's nmod does not support % + pi = int(p) + g = [ K(int(c) % pi) for c in f ] + else: + g = [ c % p for c in f ] + + return dup_strip(g) + + +def dmp_trunc(f, p, u, K): + """ + Reduce a ``K[X]`` polynomial modulo a polynomial ``p`` in ``K[Y]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3 + >>> g = (y - 1).drop(x) + + >>> R.dmp_trunc(f, g) + 11*x**2 + 11*x + 5 + + """ + return dmp_strip([ dmp_rem(c, p, u - 1, K) for c in f ], u) + + +def dmp_ground_trunc(f, p, u, K): + """ + Reduce a ``K[X]`` polynomial modulo a constant ``p`` in ``K``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3 + + >>> R.dmp_ground_trunc(f, ZZ(3)) + -x**2 - x*y - y + + """ + if not u: + return dup_trunc(f, p, K) + + v = u - 1 + + return dmp_strip([ dmp_ground_trunc(c, p, v, K) for c in f ], u) + + +def dup_monic(f, K): + """ + Divide all coefficients by ``LC(f)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> R.dup_monic(3*x**2 + 6*x + 9) + x**2 + 2*x + 3 + + >>> R, x = ring("x", QQ) + >>> R.dup_monic(3*x**2 + 4*x + 2) + x**2 + 4/3*x + 2/3 + + """ + if not f: + return f + + lc = dup_LC(f, K) + + if K.is_one(lc): + return f + else: + return dup_exquo_ground(f, lc, K) + + +def dmp_ground_monic(f, u, K): + """ + Divide all coefficients by ``LC(f)`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> f = 3*x**2*y + 6*x**2 + 3*x*y + 9*y + 3 + + >>> R.dmp_ground_monic(f) + x**2*y + 2*x**2 + x*y + 3*y + 1 + + >>> R, x,y = ring("x,y", QQ) + >>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3 + + >>> R.dmp_ground_monic(f) + x**2*y + 8/3*x**2 + 5/3*x*y + 2*x + 2/3*y + 1 + + """ + if not u: + return dup_monic(f, K) + + if dmp_zero_p(f, u): + return f + + lc = dmp_ground_LC(f, u, K) + + if K.is_one(lc): + return f + else: + return dmp_exquo_ground(f, lc, u, K) + + +def dup_content(f, K): + """ + Compute the GCD of coefficients of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> f = 6*x**2 + 8*x + 12 + + >>> R.dup_content(f) + 2 + + >>> R, x = ring("x", QQ) + >>> f = 6*x**2 + 8*x + 12 + + >>> R.dup_content(f) + 2 + + """ + from sympy.polys.domains import QQ + + if not f: + return K.zero + + cont = K.zero + + if K == QQ: + for c in f: + cont = K.gcd(cont, c) + else: + for c in f: + cont = K.gcd(cont, c) + + if K.is_one(cont): + break + + return cont + + +def dmp_ground_content(f, u, K): + """ + Compute the GCD of coefficients of ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> f = 2*x*y + 6*x + 4*y + 12 + + >>> R.dmp_ground_content(f) + 2 + + >>> R, x,y = ring("x,y", QQ) + >>> f = 2*x*y + 6*x + 4*y + 12 + + >>> R.dmp_ground_content(f) + 2 + + """ + from sympy.polys.domains import QQ + + if not u: + return dup_content(f, K) + + if dmp_zero_p(f, u): + return K.zero + + cont, v = K.zero, u - 1 + + if K == QQ: + for c in f: + cont = K.gcd(cont, dmp_ground_content(c, v, K)) + else: + for c in f: + cont = K.gcd(cont, dmp_ground_content(c, v, K)) + + if K.is_one(cont): + break + + return cont + + +def dup_primitive(f, K): + """ + Compute content and the primitive form of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x = ring("x", ZZ) + >>> f = 6*x**2 + 8*x + 12 + + >>> R.dup_primitive(f) + (2, 3*x**2 + 4*x + 6) + + >>> R, x = ring("x", QQ) + >>> f = 6*x**2 + 8*x + 12 + + >>> R.dup_primitive(f) + (2, 3*x**2 + 4*x + 6) + + """ + if not f: + return K.zero, f + + cont = dup_content(f, K) + + if K.is_one(cont): + return cont, f + else: + return cont, dup_quo_ground(f, cont, K) + + +def dmp_ground_primitive(f, u, K): + """ + Compute content and the primitive form of ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ, QQ + + >>> R, x,y = ring("x,y", ZZ) + >>> f = 2*x*y + 6*x + 4*y + 12 + + >>> R.dmp_ground_primitive(f) + (2, x*y + 3*x + 2*y + 6) + + >>> R, x,y = ring("x,y", QQ) + >>> f = 2*x*y + 6*x + 4*y + 12 + + >>> R.dmp_ground_primitive(f) + (2, x*y + 3*x + 2*y + 6) + + """ + if not u: + return dup_primitive(f, K) + + if dmp_zero_p(f, u): + return K.zero, f + + cont = dmp_ground_content(f, u, K) + + if K.is_one(cont): + return cont, f + else: + return cont, dmp_quo_ground(f, cont, u, K) + + +def dup_extract(f, g, K): + """ + Extract common content from a pair of polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_extract(6*x**2 + 12*x + 18, 4*x**2 + 8*x + 12) + (2, 3*x**2 + 6*x + 9, 2*x**2 + 4*x + 6) + + """ + fc = dup_content(f, K) + gc = dup_content(g, K) + + gcd = K.gcd(fc, gc) + + if not K.is_one(gcd): + f = dup_quo_ground(f, gcd, K) + g = dup_quo_ground(g, gcd, K) + + return gcd, f, g + + +def dmp_ground_extract(f, g, u, K): + """ + Extract common content from a pair of polynomials in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_ground_extract(6*x*y + 12*x + 18, 4*x*y + 8*x + 12) + (2, 3*x*y + 6*x + 9, 2*x*y + 4*x + 6) + + """ + fc = dmp_ground_content(f, u, K) + gc = dmp_ground_content(g, u, K) + + gcd = K.gcd(fc, gc) + + if not K.is_one(gcd): + f = dmp_quo_ground(f, gcd, u, K) + g = dmp_quo_ground(g, gcd, u, K) + + return gcd, f, g + + +def dup_real_imag(f, K): + """ + Find ``f1`` and ``f2``, such that ``f(x+I*y) = f1(x,y) + f2(x,y)*I``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dup_real_imag(x**3 + x**2 + x + 1) + (x**3 + x**2 - 3*x*y**2 + x - y**2 + 1, 3*x**2*y + 2*x*y - y**3 + y) + + >>> from sympy.abc import x, y, z + >>> from sympy import I + >>> (z**3 + z**2 + z + 1).subs(z, x+I*y).expand().collect(I) + x**3 + x**2 - 3*x*y**2 + x - y**2 + I*(3*x**2*y + 2*x*y - y**3 + y) + 1 + + """ + if not K.is_ZZ and not K.is_QQ: + raise DomainError("computing real and imaginary parts is not supported over %s" % K) + + f1 = dmp_zero(1) + f2 = dmp_zero(1) + + if not f: + return f1, f2 + + g = [[[K.one, K.zero]], [[K.one], []]] + h = dmp_ground(f[0], 2) + + for c in f[1:]: + h = dmp_mul(h, g, 2, K) + h = dmp_add_term(h, dmp_ground(c, 1), 0, 2, K) + + H = dup_to_raw_dict(h) + + for k, h in H.items(): + m = k % 4 + + if not m: + f1 = dmp_add(f1, h, 1, K) + elif m == 1: + f2 = dmp_add(f2, h, 1, K) + elif m == 2: + f1 = dmp_sub(f1, h, 1, K) + else: + f2 = dmp_sub(f2, h, 1, K) + + return f1, f2 + + +def dup_mirror(f, K): + """ + Evaluate efficiently the composition ``f(-x)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_mirror(x**3 + 2*x**2 - 4*x + 2) + -x**3 + 2*x**2 + 4*x + 2 + + """ + f = list(f) + + for i in range(len(f) - 2, -1, -2): + f[i] = -f[i] + + return f + + +def dup_scale(f, a, K): + """ + Evaluate efficiently composition ``f(a*x)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_scale(x**2 - 2*x + 1, ZZ(2)) + 4*x**2 - 4*x + 1 + + """ + f, n, b = list(f), len(f) - 1, a + + for i in range(n - 1, -1, -1): + f[i], b = b*f[i], b*a + + return f + + +def dup_shift(f, a, K): + """ + Evaluate efficiently Taylor shift ``f(x + a)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_shift(x**2 - 2*x + 1, ZZ(2)) + x**2 + 2*x + 1 + + """ + f, n = list(f), len(f) - 1 + + for i in range(n, 0, -1): + for j in range(0, i): + f[j + 1] += a*f[j] + + return f + + +def dmp_shift(f, a, u, K): + """ + Evaluate efficiently Taylor shift ``f(X + A)`` in ``K[X]``. + + Examples + ======== + + >>> from sympy import symbols, ring, ZZ + >>> x, y = symbols('x y') + >>> R, _, _ = ring([x, y], ZZ) + + >>> p = x**2*y + 2*x*y + 3*x + 4*y + 5 + + >>> R.dmp_shift(R(p), [ZZ(1), ZZ(2)]) + x**2*y + 2*x**2 + 4*x*y + 11*x + 7*y + 22 + + >>> p.subs({x: x + 1, y: y + 2}).expand() + x**2*y + 2*x**2 + 4*x*y + 11*x + 7*y + 22 + """ + if not u: + return dup_shift(f, a[0], K) + + if dmp_zero_p(f, u): + return f + + a0, a1 = a[0], a[1:] + + if any(a1): + f = [ dmp_shift(c, a1, u-1, K) for c in f ] + else: + f = list(f) + + if a0: + n = len(f) - 1 + + for i in range(n, 0, -1): + for j in range(0, i): + afj = dmp_mul_ground(f[j], a0, u-1, K) + f[j + 1] = dmp_add(f[j + 1], afj, u-1, K) + + return dmp_strip(f, u) + + +def dup_transform(f, p, q, K): + """ + Evaluate functional transformation ``q**n * f(p/q)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_transform(x**2 - 2*x + 1, x**2 + 1, x - 1) + x**4 - 2*x**3 + 5*x**2 - 4*x + 4 + + """ + if not f: + return [] + + n = len(f) - 1 + h, Q = [f[0]], [[K.one]] + + for i in range(0, n): + Q.append(dup_mul(Q[-1], q, K)) + + for c, q in zip(f[1:], Q[1:]): + h = dup_mul(h, p, K) + q = dup_mul_ground(q, c, K) + h = dup_add(h, q, K) + + return h + + +def dup_compose(f, g, K): + """ + Evaluate functional composition ``f(g)`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_compose(x**2 + x, x - 1) + x**2 - x + + """ + if len(g) <= 1: + return dup_strip([dup_eval(f, dup_LC(g, K), K)]) + + if not f: + return [] + + h = [f[0]] + + for c in f[1:]: + h = dup_mul(h, g, K) + h = dup_add_term(h, c, 0, K) + + return h + + +def dmp_compose(f, g, u, K): + """ + Evaluate functional composition ``f(g)`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_compose(x*y + 2*x + y, y) + y**2 + 3*y + + """ + if not u: + return dup_compose(f, g, K) + + if dmp_zero_p(f, u): + return f + + h = [f[0]] + + for c in f[1:]: + h = dmp_mul(h, g, u, K) + h = dmp_add_term(h, c, 0, u, K) + + return h + + +def _dup_right_decompose(f, s, K): + """Helper function for :func:`_dup_decompose`.""" + n = len(f) - 1 + lc = dup_LC(f, K) + + f = dup_to_raw_dict(f) + g = { s: K.one } + + r = n // s + + for i in range(1, s): + coeff = K.zero + + for j in range(0, i): + if not n + j - i in f: + continue + + if not s - j in g: + continue + + fc, gc = f[n + j - i], g[s - j] + coeff += (i - r*j)*fc*gc + + g[s - i] = K.quo(coeff, i*r*lc) + + return dup_from_raw_dict(g, K) + + +def _dup_left_decompose(f, h, K): + """Helper function for :func:`_dup_decompose`.""" + g, i = {}, 0 + + while f: + q, r = dup_div(f, h, K) + + if dup_degree(r) > 0: + return None + else: + g[i] = dup_LC(r, K) + f, i = q, i + 1 + + return dup_from_raw_dict(g, K) + + +def _dup_decompose(f, K): + """Helper function for :func:`dup_decompose`.""" + df = len(f) - 1 + + for s in range(2, df): + if df % s != 0: + continue + + h = _dup_right_decompose(f, s, K) + + if h is not None: + g = _dup_left_decompose(f, h, K) + + if g is not None: + return g, h + + return None + + +def dup_decompose(f, K): + """ + Computes functional decomposition of ``f`` in ``K[x]``. + + Given a univariate polynomial ``f`` with coefficients in a field of + characteristic zero, returns list ``[f_1, f_2, ..., f_n]``, where:: + + f = f_1 o f_2 o ... f_n = f_1(f_2(... f_n)) + + and ``f_2, ..., f_n`` are monic and homogeneous polynomials of at + least second degree. + + Unlike factorization, complete functional decompositions of + polynomials are not unique, consider examples: + + 1. ``f o g = f(x + b) o (g - b)`` + 2. ``x**n o x**m = x**m o x**n`` + 3. ``T_n o T_m = T_m o T_n`` + + where ``T_n`` and ``T_m`` are Chebyshev polynomials. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_decompose(x**4 - 2*x**3 + x**2) + [x**2, x**2 - x] + + References + ========== + + .. [1] [Kozen89]_ + + """ + F = [] + + while True: + result = _dup_decompose(f, K) + + if result is not None: + f, h = result + F = [h] + F + else: + break + + return [f] + F + + +def dmp_alg_inject(f, u, K): + """ + Convert polynomial from ``K(a)[X]`` to ``K[a,X]``. + + Examples + ======== + + >>> from sympy.polys.densetools import dmp_alg_inject + >>> from sympy import QQ, sqrt + + >>> K = QQ.algebraic_field(sqrt(2)) + + >>> p = [K.from_sympy(sqrt(2)), K.zero, K.one] + >>> P, lev, dom = dmp_alg_inject(p, 0, K) + >>> P + [[1, 0, 0], [1]] + >>> lev + 1 + >>> dom + QQ + + """ + if K.is_GaussianRing or K.is_GaussianField: + return _dmp_alg_inject_gaussian(f, u, K) + elif K.is_Algebraic: + return _dmp_alg_inject_alg(f, u, K) + else: + raise DomainError('computation can be done only in an algebraic domain') + + +def _dmp_alg_inject_gaussian(f, u, K): + """Helper function for :func:`dmp_alg_inject`.""" + f, h = dmp_to_dict(f, u), {} + + for f_monom, g in f.items(): + x, y = g.x, g.y + if x: + h[(0,) + f_monom] = x + if y: + h[(1,) + f_monom] = y + + F = dmp_from_dict(h, u + 1, K.dom) + + return F, u + 1, K.dom + + +def _dmp_alg_inject_alg(f, u, K): + """Helper function for :func:`dmp_alg_inject`.""" + f, h = dmp_to_dict(f, u), {} + + for f_monom, g in f.items(): + for g_monom, c in g.to_dict().items(): + h[g_monom + f_monom] = c + + F = dmp_from_dict(h, u + 1, K.dom) + + return F, u + 1, K.dom + + +def dmp_lift(f, u, K): + """ + Convert algebraic coefficients to integers in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> from sympy import I + + >>> K = QQ.algebraic_field(I) + >>> R, x = ring("x", K) + + >>> f = x**2 + K([QQ(1), QQ(0)])*x + K([QQ(2), QQ(0)]) + + >>> R.dmp_lift(f) + x**4 + x**2 + 4*x + 4 + + """ + # Circular import. Probably dmp_lift should be moved to euclidtools + from .euclidtools import dmp_resultant + + F, v, K2 = dmp_alg_inject(f, u, K) + + p_a = K.mod.to_list() + P_A = dmp_include(p_a, list(range(1, v + 1)), 0, K2) + + return dmp_resultant(F, P_A, v, K2) + + +def dup_sign_variations(f, K): + """ + Compute the number of sign variations of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sign_variations(x**4 - x**2 - x + 1) + 2 + + """ + def is_negative_sympy(a): + if not a: + # XXX: requires zero equivalence testing in the domain + return False + else: + # XXX: This is inefficient. It should not be necessary to use a + # symbolic expression here at least for algebraic fields. If the + # domain elements can be numerically evaluated to real values with + # precision then this should work. We first need to rule out zero + # elements though. + return bool(K.to_sympy(a) < 0) + + # XXX: There should be a way to check for real numeric domains and + # Domain.is_negative should be fixed to handle all real numeric domains. + # It should not be necessary to special case all these different domains + # in this otherwise generic function. + if K.is_ZZ or K.is_QQ or K.is_RR: + is_negative = K.is_negative + elif K.is_AlgebraicField and K.ext.is_comparable: + is_negative = is_negative_sympy + elif ((K.is_PolynomialRing or K.is_FractionField) and len(K.symbols) == 1 and + (K.dom.is_ZZ or K.dom.is_QQ or K.is_AlgebraicField) and + K.symbols[0].is_transcendental and K.symbols[0].is_comparable): + # We can handle a polynomial ring like QQ[E] if there is a single + # transcendental generator because then zero equivalence is assured. + is_negative = is_negative_sympy + else: + raise DomainError("sign variation counting not supported over %s" % K) + + prev, k = K.zero, 0 + + for coeff in f: + if is_negative(coeff*prev): + k += 1 + + if coeff: + prev = coeff + + return k + + +def dup_clear_denoms(f, K0, K1=None, convert=False): + """ + Clear denominators, i.e. transform ``K_0`` to ``K_1``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = QQ(1,2)*x + QQ(1,3) + + >>> R.dup_clear_denoms(f, convert=False) + (6, 3*x + 2) + >>> R.dup_clear_denoms(f, convert=True) + (6, 3*x + 2) + + """ + if K1 is None: + if K0.has_assoc_Ring: + K1 = K0.get_ring() + else: + K1 = K0 + + common = K1.one + + for c in f: + common = K1.lcm(common, K0.denom(c)) + + if K1.is_one(common): + if not convert: + return common, f + else: + return common, dup_convert(f, K0, K1) + + # Use quo rather than exquo to handle inexact domains by discarding the + # remainder. + f = [K0.numer(c)*K1.quo(common, K0.denom(c)) for c in f] + + if not convert: + return common, dup_convert(f, K1, K0) + else: + return common, f + + +def _rec_clear_denoms(g, v, K0, K1): + """Recursive helper for :func:`dmp_clear_denoms`.""" + common = K1.one + + if not v: + for c in g: + common = K1.lcm(common, K0.denom(c)) + else: + w = v - 1 + + for c in g: + common = K1.lcm(common, _rec_clear_denoms(c, w, K0, K1)) + + return common + + +def dmp_clear_denoms(f, u, K0, K1=None, convert=False): + """ + Clear denominators, i.e. transform ``K_0`` to ``K_1``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> f = QQ(1,2)*x + QQ(1,3)*y + 1 + + >>> R.dmp_clear_denoms(f, convert=False) + (6, 3*x + 2*y + 6) + >>> R.dmp_clear_denoms(f, convert=True) + (6, 3*x + 2*y + 6) + + """ + if not u: + return dup_clear_denoms(f, K0, K1, convert=convert) + + if K1 is None: + if K0.has_assoc_Ring: + K1 = K0.get_ring() + else: + K1 = K0 + + common = _rec_clear_denoms(f, u, K0, K1) + + if not K1.is_one(common): + f = dmp_mul_ground(f, common, u, K0) + + if not convert: + return common, f + else: + return common, dmp_convert(f, u, K0, K1) + + +def dup_revert(f, n, K): + """ + Compute ``f**(-1)`` mod ``x**n`` using Newton iteration. + + This function computes first ``2**n`` terms of a polynomial that + is a result of inversion of a polynomial modulo ``x**n``. This is + useful to efficiently compute series expansion of ``1/f``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = -QQ(1,720)*x**6 + QQ(1,24)*x**4 - QQ(1,2)*x**2 + 1 + + >>> R.dup_revert(f, 8) + 61/720*x**6 + 5/24*x**4 + 1/2*x**2 + 1 + + """ + g = [K.revert(dup_TC(f, K))] + h = [K.one, K.zero, K.zero] + + N = int(_ceil(_log2(n))) + + for i in range(1, N + 1): + a = dup_mul_ground(g, K(2), K) + b = dup_mul(f, dup_sqr(g, K), K) + g = dup_rem(dup_sub(a, b, K), h, K) + h = dup_lshift(h, dup_degree(h), K) + + return g + + +def dmp_revert(f, g, u, K): + """ + Compute ``f**(-1)`` mod ``x**n`` using Newton iteration. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + """ + if not u: + return dup_revert(f, g, K) + else: + raise MultivariatePolynomialError(f, g) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/dispersion.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/dispersion.py new file mode 100644 index 0000000000000000000000000000000000000000..699277d221f24b9bff42c55c3bb34fe5783ae7a1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/dispersion.py @@ -0,0 +1,212 @@ +from sympy.core import S +from sympy.polys import Poly + + +def dispersionset(p, q=None, *gens, **args): + r"""Compute the *dispersion set* of two polynomials. + + For two polynomials `f(x)` and `g(x)` with `\deg f > 0` + and `\deg g > 0` the dispersion set `\operatorname{J}(f, g)` is defined as: + + .. math:: + \operatorname{J}(f, g) + & := \{a \in \mathbb{N}_0 | \gcd(f(x), g(x+a)) \neq 1\} \\ + & = \{a \in \mathbb{N}_0 | \deg \gcd(f(x), g(x+a)) \geq 1\} + + For a single polynomial one defines `\operatorname{J}(f) := \operatorname{J}(f, f)`. + + Examples + ======== + + >>> from sympy import poly + >>> from sympy.polys.dispersion import dispersion, dispersionset + >>> from sympy.abc import x + + Dispersion set and dispersion of a simple polynomial: + + >>> fp = poly((x - 3)*(x + 3), x) + >>> sorted(dispersionset(fp)) + [0, 6] + >>> dispersion(fp) + 6 + + Note that the definition of the dispersion is not symmetric: + + >>> fp = poly(x**4 - 3*x**2 + 1, x) + >>> gp = fp.shift(-3) + >>> sorted(dispersionset(fp, gp)) + [2, 3, 4] + >>> dispersion(fp, gp) + 4 + >>> sorted(dispersionset(gp, fp)) + [] + >>> dispersion(gp, fp) + -oo + + Computing the dispersion also works over field extensions: + + >>> from sympy import sqrt + >>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ') + >>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ') + >>> sorted(dispersionset(fp, gp)) + [2] + >>> sorted(dispersionset(gp, fp)) + [1, 4] + + We can even perform the computations for polynomials + having symbolic coefficients: + + >>> from sympy.abc import a + >>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x) + >>> sorted(dispersionset(fp)) + [0, 1] + + See Also + ======== + + dispersion + + References + ========== + + .. [1] [ManWright94]_ + .. [2] [Koepf98]_ + .. [3] [Abramov71]_ + .. [4] [Man93]_ + """ + # Check for valid input + same = False if q is not None else True + if same: + q = p + + p = Poly(p, *gens, **args) + q = Poly(q, *gens, **args) + + if not p.is_univariate or not q.is_univariate: + raise ValueError("Polynomials need to be univariate") + + # The generator + if not p.gen == q.gen: + raise ValueError("Polynomials must have the same generator") + gen = p.gen + + # We define the dispersion of constant polynomials to be zero + if p.degree() < 1 or q.degree() < 1: + return {0} + + # Factor p and q over the rationals + fp = p.factor_list() + fq = q.factor_list() if not same else fp + + # Iterate over all pairs of factors + J = set() + for s, unused in fp[1]: + for t, unused in fq[1]: + m = s.degree() + n = t.degree() + if n != m: + continue + an = s.LC() + bn = t.LC() + if not (an - bn).is_zero: + continue + # Note that the roles of `s` and `t` below are switched + # w.r.t. the original paper. This is for consistency + # with the description in the book of W. Koepf. + anm1 = s.coeff_monomial(gen**(m-1)) + bnm1 = t.coeff_monomial(gen**(n-1)) + alpha = (anm1 - bnm1) / S(n*bn) + if not alpha.is_integer: + continue + if alpha < 0 or alpha in J: + continue + if n > 1 and not (s - t.shift(alpha)).is_zero: + continue + J.add(alpha) + + return J + + +def dispersion(p, q=None, *gens, **args): + r"""Compute the *dispersion* of polynomials. + + For two polynomials `f(x)` and `g(x)` with `\deg f > 0` + and `\deg g > 0` the dispersion `\operatorname{dis}(f, g)` is defined as: + + .. math:: + \operatorname{dis}(f, g) + & := \max\{ J(f,g) \cup \{0\} \} \\ + & = \max\{ \{a \in \mathbb{N} | \gcd(f(x), g(x+a)) \neq 1\} \cup \{0\} \} + + and for a single polynomial `\operatorname{dis}(f) := \operatorname{dis}(f, f)`. + Note that we make the definition `\max\{\} := -\infty`. + + Examples + ======== + + >>> from sympy import poly + >>> from sympy.polys.dispersion import dispersion, dispersionset + >>> from sympy.abc import x + + Dispersion set and dispersion of a simple polynomial: + + >>> fp = poly((x - 3)*(x + 3), x) + >>> sorted(dispersionset(fp)) + [0, 6] + >>> dispersion(fp) + 6 + + Note that the definition of the dispersion is not symmetric: + + >>> fp = poly(x**4 - 3*x**2 + 1, x) + >>> gp = fp.shift(-3) + >>> sorted(dispersionset(fp, gp)) + [2, 3, 4] + >>> dispersion(fp, gp) + 4 + >>> sorted(dispersionset(gp, fp)) + [] + >>> dispersion(gp, fp) + -oo + + The maximum of an empty set is defined to be `-\infty` + as seen in this example. + + Computing the dispersion also works over field extensions: + + >>> from sympy import sqrt + >>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ') + >>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ') + >>> sorted(dispersionset(fp, gp)) + [2] + >>> sorted(dispersionset(gp, fp)) + [1, 4] + + We can even perform the computations for polynomials + having symbolic coefficients: + + >>> from sympy.abc import a + >>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x) + >>> sorted(dispersionset(fp)) + [0, 1] + + See Also + ======== + + dispersionset + + References + ========== + + .. [1] [ManWright94]_ + .. [2] [Koepf98]_ + .. [3] [Abramov71]_ + .. [4] [Man93]_ + """ + J = dispersionset(p, q, *gens, **args) + if not J: + # Definition for maximum of empty set + j = S.NegativeInfinity + else: + j = max(J) + return j diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/distributedmodules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/distributedmodules.py new file mode 100644 index 0000000000000000000000000000000000000000..df4581e58951a9c29b9e5b085311f5e6cb00f381 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/distributedmodules.py @@ -0,0 +1,739 @@ +r""" +Sparse distributed elements of free modules over multivariate (generalized) +polynomial rings. + +This code and its data structures are very much like the distributed +polynomials, except that the first "exponent" of the monomial is +a module generator index. That is, the multi-exponent ``(i, e_1, ..., e_n)`` +represents the "monomial" `x_1^{e_1} \cdots x_n^{e_n} f_i` of the free module +`F` generated by `f_1, \ldots, f_r` over (a localization of) the ring +`K[x_1, \ldots, x_n]`. A module element is simply stored as a list of terms +ordered by the monomial order. Here a term is a pair of a multi-exponent and a +coefficient. In general, this coefficient should never be zero (since it can +then be omitted). The zero module element is stored as an empty list. + +The main routines are ``sdm_nf_mora`` and ``sdm_groebner`` which can be used +to compute, respectively, weak normal forms and standard bases. They work with +arbitrary (not necessarily global) monomial orders. + +In general, product orders have to be used to construct valid monomial orders +for modules. However, ``lex`` can be used as-is. + +Note that the "level" (number of variables, i.e. parameter u+1 in +distributedpolys.py) is never needed in this code. + +The main reference for this file is [SCA], +"A Singular Introduction to Commutative Algebra". +""" + + +from itertools import permutations + +from sympy.polys.monomials import ( + monomial_mul, monomial_lcm, monomial_div, monomial_deg +) + +from sympy.polys.polytools import Poly +from sympy.polys.polyutils import parallel_dict_from_expr +from sympy.core.singleton import S +from sympy.core.sympify import sympify + +# Additional monomial tools. + + +def sdm_monomial_mul(M, X): + """ + Multiply tuple ``X`` representing a monomial of `K[X]` into the tuple + ``M`` representing a monomial of `F`. + + Examples + ======== + + Multiplying `xy^3` into `x f_1` yields `x^2 y^3 f_1`: + + >>> from sympy.polys.distributedmodules import sdm_monomial_mul + >>> sdm_monomial_mul((1, 1, 0), (1, 3)) + (1, 2, 3) + """ + return (M[0],) + monomial_mul(X, M[1:]) + + +def sdm_monomial_deg(M): + """ + Return the total degree of ``M``. + + Examples + ======== + + For example, the total degree of `x^2 y f_5` is 3: + + >>> from sympy.polys.distributedmodules import sdm_monomial_deg + >>> sdm_monomial_deg((5, 2, 1)) + 3 + """ + return monomial_deg(M[1:]) + + +def sdm_monomial_lcm(A, B): + r""" + Return the "least common multiple" of ``A`` and ``B``. + + IF `A = M e_j` and `B = N e_j`, where `M` and `N` are polynomial monomials, + this returns `\lcm(M, N) e_j`. Note that ``A`` and ``B`` involve distinct + monomials. + + Otherwise the result is undefined. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_monomial_lcm + >>> sdm_monomial_lcm((1, 2, 3), (1, 0, 5)) + (1, 2, 5) + """ + return (A[0],) + monomial_lcm(A[1:], B[1:]) + + +def sdm_monomial_divides(A, B): + """ + Does there exist a (polynomial) monomial X such that XA = B? + + Examples + ======== + + Positive examples: + + In the following examples, the monomial is given in terms of x, y and the + generator(s), f_1, f_2 etc. The tuple form of that monomial is used in + the call to sdm_monomial_divides. + Note: the generator appears last in the expression but first in the tuple + and other factors appear in the same order that they appear in the monomial + expression. + + `A = f_1` divides `B = f_1` + + >>> from sympy.polys.distributedmodules import sdm_monomial_divides + >>> sdm_monomial_divides((1, 0, 0), (1, 0, 0)) + True + + `A = f_1` divides `B = x^2 y f_1` + + >>> sdm_monomial_divides((1, 0, 0), (1, 2, 1)) + True + + `A = xy f_5` divides `B = x^2 y f_5` + + >>> sdm_monomial_divides((5, 1, 1), (5, 2, 1)) + True + + Negative examples: + + `A = f_1` does not divide `B = f_2` + + >>> sdm_monomial_divides((1, 0, 0), (2, 0, 0)) + False + + `A = x f_1` does not divide `B = f_1` + + >>> sdm_monomial_divides((1, 1, 0), (1, 0, 0)) + False + + `A = xy^2 f_5` does not divide `B = y f_5` + + >>> sdm_monomial_divides((5, 1, 2), (5, 0, 1)) + False + """ + return A[0] == B[0] and all(a <= b for a, b in zip(A[1:], B[1:])) + + +# The actual distributed modules code. + +def sdm_LC(f, K): + """Returns the leading coefficient of ``f``. """ + if not f: + return K.zero + else: + return f[0][1] + + +def sdm_to_dict(f): + """Make a dictionary from a distributed polynomial. """ + return dict(f) + + +def sdm_from_dict(d, O): + """ + Create an sdm from a dictionary. + + Here ``O`` is the monomial order to use. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_from_dict + >>> from sympy.polys import QQ, lex + >>> dic = {(1, 1, 0): QQ(1), (1, 0, 0): QQ(2), (0, 1, 0): QQ(0)} + >>> sdm_from_dict(dic, lex) + [((1, 1, 0), 1), ((1, 0, 0), 2)] + """ + return sdm_strip(sdm_sort(list(d.items()), O)) + + +def sdm_sort(f, O): + """Sort terms in ``f`` using the given monomial order ``O``. """ + return sorted(f, key=lambda term: O(term[0]), reverse=True) + + +def sdm_strip(f): + """Remove terms with zero coefficients from ``f`` in ``K[X]``. """ + return [ (monom, coeff) for monom, coeff in f if coeff ] + + +def sdm_add(f, g, O, K): + """ + Add two module elements ``f``, ``g``. + + Addition is done over the ground field ``K``, monomials are ordered + according to ``O``. + + Examples + ======== + + All examples use lexicographic order. + + `(xy f_1) + (f_2) = f_2 + xy f_1` + + >>> from sympy.polys.distributedmodules import sdm_add + >>> from sympy.polys import lex, QQ + >>> sdm_add([((1, 1, 1), QQ(1))], [((2, 0, 0), QQ(1))], lex, QQ) + [((2, 0, 0), 1), ((1, 1, 1), 1)] + + `(xy f_1) + (-xy f_1)` = 0` + + >>> sdm_add([((1, 1, 1), QQ(1))], [((1, 1, 1), QQ(-1))], lex, QQ) + [] + + `(f_1) + (2f_1) = 3f_1` + + >>> sdm_add([((1, 0, 0), QQ(1))], [((1, 0, 0), QQ(2))], lex, QQ) + [((1, 0, 0), 3)] + + `(yf_1) + (xf_1) = xf_1 + yf_1` + + >>> sdm_add([((1, 0, 1), QQ(1))], [((1, 1, 0), QQ(1))], lex, QQ) + [((1, 1, 0), 1), ((1, 0, 1), 1)] + """ + h = dict(f) + + for monom, c in g: + if monom in h: + coeff = h[monom] + c + + if not coeff: + del h[monom] + else: + h[monom] = coeff + else: + h[monom] = c + + return sdm_from_dict(h, O) + + +def sdm_LM(f): + r""" + Returns the leading monomial of ``f``. + + Only valid if `f \ne 0`. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_LM, sdm_from_dict + >>> from sympy.polys import QQ, lex + >>> dic = {(1, 2, 3): QQ(1), (4, 0, 0): QQ(1), (4, 0, 1): QQ(1)} + >>> sdm_LM(sdm_from_dict(dic, lex)) + (4, 0, 1) + """ + return f[0][0] + + +def sdm_LT(f): + r""" + Returns the leading term of ``f``. + + Only valid if `f \ne 0`. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_LT, sdm_from_dict + >>> from sympy.polys import QQ, lex + >>> dic = {(1, 2, 3): QQ(1), (4, 0, 0): QQ(2), (4, 0, 1): QQ(3)} + >>> sdm_LT(sdm_from_dict(dic, lex)) + ((4, 0, 1), 3) + """ + return f[0] + + +def sdm_mul_term(f, term, O, K): + """ + Multiply a distributed module element ``f`` by a (polynomial) term ``term``. + + Multiplication of coefficients is done over the ground field ``K``, and + monomials are ordered according to ``O``. + + Examples + ======== + + `0 f_1 = 0` + + >>> from sympy.polys.distributedmodules import sdm_mul_term + >>> from sympy.polys import lex, QQ + >>> sdm_mul_term([((1, 0, 0), QQ(1))], ((0, 0), QQ(0)), lex, QQ) + [] + + `x 0 = 0` + + >>> sdm_mul_term([], ((1, 0), QQ(1)), lex, QQ) + [] + + `(x) (f_1) = xf_1` + + >>> sdm_mul_term([((1, 0, 0), QQ(1))], ((1, 0), QQ(1)), lex, QQ) + [((1, 1, 0), 1)] + + `(2xy) (3x f_1 + 4y f_2) = 8xy^2 f_2 + 6x^2y f_1` + + >>> f = [((2, 0, 1), QQ(4)), ((1, 1, 0), QQ(3))] + >>> sdm_mul_term(f, ((1, 1), QQ(2)), lex, QQ) + [((2, 1, 2), 8), ((1, 2, 1), 6)] + """ + X, c = term + + if not f or not c: + return [] + else: + if K.is_one(c): + return [ (sdm_monomial_mul(f_M, X), f_c) for f_M, f_c in f ] + else: + return [ (sdm_monomial_mul(f_M, X), f_c * c) for f_M, f_c in f ] + + +def sdm_zero(): + """Return the zero module element.""" + return [] + + +def sdm_deg(f): + """ + Degree of ``f``. + + This is the maximum of the degrees of all its monomials. + Invalid if ``f`` is zero. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_deg + >>> sdm_deg([((1, 2, 3), 1), ((10, 0, 1), 1), ((2, 3, 4), 4)]) + 7 + """ + return max(sdm_monomial_deg(M[0]) for M in f) + + +# Conversion + +def sdm_from_vector(vec, O, K, **opts): + """ + Create an sdm from an iterable of expressions. + + Coefficients are created in the ground field ``K``, and terms are ordered + according to monomial order ``O``. Named arguments are passed on to the + polys conversion code and can be used to specify for example generators. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_from_vector + >>> from sympy.abc import x, y, z + >>> from sympy.polys import QQ, lex + >>> sdm_from_vector([x**2+y**2, 2*z], lex, QQ) + [((1, 0, 0, 1), 2), ((0, 2, 0, 0), 1), ((0, 0, 2, 0), 1)] + """ + dics, gens = parallel_dict_from_expr(sympify(vec), **opts) + dic = {} + for i, d in enumerate(dics): + for k, v in d.items(): + dic[(i,) + k] = K.convert(v) + return sdm_from_dict(dic, O) + + +def sdm_to_vector(f, gens, K, n=None): + """ + Convert sdm ``f`` into a list of polynomial expressions. + + The generators for the polynomial ring are specified via ``gens``. The rank + of the module is guessed, or passed via ``n``. The ground field is assumed + to be ``K``. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_to_vector + >>> from sympy.abc import x, y, z + >>> from sympy.polys import QQ + >>> f = [((1, 0, 0, 1), QQ(2)), ((0, 2, 0, 0), QQ(1)), ((0, 0, 2, 0), QQ(1))] + >>> sdm_to_vector(f, [x, y, z], QQ) + [x**2 + y**2, 2*z] + """ + dic = sdm_to_dict(f) + dics = {} + for k, v in dic.items(): + dics.setdefault(k[0], []).append((k[1:], v)) + n = n or len(dics) + res = [] + for k in range(n): + if k in dics: + res.append(Poly(dict(dics[k]), gens=gens, domain=K).as_expr()) + else: + res.append(S.Zero) + return res + +# Algorithms. + + +def sdm_spoly(f, g, O, K, phantom=None): + """ + Compute the generalized s-polynomial of ``f`` and ``g``. + + The ground field is assumed to be ``K``, and monomials ordered according to + ``O``. + + This is invalid if either of ``f`` or ``g`` is zero. + + If the leading terms of `f` and `g` involve different basis elements of + `F`, their s-poly is defined to be zero. Otherwise it is a certain linear + combination of `f` and `g` in which the leading terms cancel. + See [SCA, defn 2.3.6] for details. + + If ``phantom`` is not ``None``, it should be a pair of module elements on + which to perform the same operation(s) as on ``f`` and ``g``. The in this + case both results are returned. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_spoly + >>> from sympy.polys import QQ, lex + >>> f = [((2, 1, 1), QQ(1)), ((1, 0, 1), QQ(1))] + >>> g = [((2, 3, 0), QQ(1))] + >>> h = [((1, 2, 3), QQ(1))] + >>> sdm_spoly(f, h, lex, QQ) + [] + >>> sdm_spoly(f, g, lex, QQ) + [((1, 2, 1), 1)] + """ + if not f or not g: + return sdm_zero() + LM1 = sdm_LM(f) + LM2 = sdm_LM(g) + if LM1[0] != LM2[0]: + return sdm_zero() + LM1 = LM1[1:] + LM2 = LM2[1:] + lcm = monomial_lcm(LM1, LM2) + m1 = monomial_div(lcm, LM1) + m2 = monomial_div(lcm, LM2) + c = K.quo(-sdm_LC(f, K), sdm_LC(g, K)) + r1 = sdm_add(sdm_mul_term(f, (m1, K.one), O, K), + sdm_mul_term(g, (m2, c), O, K), O, K) + if phantom is None: + return r1 + r2 = sdm_add(sdm_mul_term(phantom[0], (m1, K.one), O, K), + sdm_mul_term(phantom[1], (m2, c), O, K), O, K) + return r1, r2 + + +def sdm_ecart(f): + """ + Compute the ecart of ``f``. + + This is defined to be the difference of the total degree of `f` and the + total degree of the leading monomial of `f` [SCA, defn 2.3.7]. + + Invalid if f is zero. + + Examples + ======== + + >>> from sympy.polys.distributedmodules import sdm_ecart + >>> sdm_ecart([((1, 2, 3), 1), ((1, 0, 1), 1)]) + 0 + >>> sdm_ecart([((2, 2, 1), 1), ((1, 5, 1), 1)]) + 3 + """ + return sdm_deg(f) - sdm_monomial_deg(sdm_LM(f)) + + +def sdm_nf_mora(f, G, O, K, phantom=None): + r""" + Compute a weak normal form of ``f`` with respect to ``G`` and order ``O``. + + The ground field is assumed to be ``K``, and monomials ordered according to + ``O``. + + Weak normal forms are defined in [SCA, defn 2.3.3]. They are not unique. + This function deterministically computes a weak normal form, depending on + the order of `G`. + + The most important property of a weak normal form is the following: if + `R` is the ring associated with the monomial ordering (if the ordering is + global, we just have `R = K[x_1, \ldots, x_n]`, otherwise it is a certain + localization thereof), `I` any ideal of `R` and `G` a standard basis for + `I`, then for any `f \in R`, we have `f \in I` if and only if + `NF(f | G) = 0`. + + This is the generalized Mora algorithm for computing weak normal forms with + respect to arbitrary monomial orders [SCA, algorithm 2.3.9]. + + If ``phantom`` is not ``None``, it should be a pair of "phantom" arguments + on which to perform the same computations as on ``f``, ``G``, both results + are then returned. + """ + from itertools import repeat + h = f + T = list(G) + if phantom is not None: + # "phantom" variables with suffix p + hp = phantom[0] + Tp = list(phantom[1]) + phantom = True + else: + Tp = repeat([]) + phantom = False + while h: + # TODO better data structure!!! + Th = [(g, sdm_ecart(g), gp) for g, gp in zip(T, Tp) + if sdm_monomial_divides(sdm_LM(g), sdm_LM(h))] + if not Th: + break + g, _, gp = min(Th, key=lambda x: x[1]) + if sdm_ecart(g) > sdm_ecart(h): + T.append(h) + if phantom: + Tp.append(hp) + if phantom: + h, hp = sdm_spoly(h, g, O, K, phantom=(hp, gp)) + else: + h = sdm_spoly(h, g, O, K) + if phantom: + return h, hp + return h + + +def sdm_nf_buchberger(f, G, O, K, phantom=None): + r""" + Compute a weak normal form of ``f`` with respect to ``G`` and order ``O``. + + The ground field is assumed to be ``K``, and monomials ordered according to + ``O``. + + This is the standard Buchberger algorithm for computing weak normal forms with + respect to *global* monomial orders [SCA, algorithm 1.6.10]. + + If ``phantom`` is not ``None``, it should be a pair of "phantom" arguments + on which to perform the same computations as on ``f``, ``G``, both results + are then returned. + """ + from itertools import repeat + h = f + T = list(G) + if phantom is not None: + # "phantom" variables with suffix p + hp = phantom[0] + Tp = list(phantom[1]) + phantom = True + else: + Tp = repeat([]) + phantom = False + while h: + try: + g, gp = next((g, gp) for g, gp in zip(T, Tp) + if sdm_monomial_divides(sdm_LM(g), sdm_LM(h))) + except StopIteration: + break + if phantom: + h, hp = sdm_spoly(h, g, O, K, phantom=(hp, gp)) + else: + h = sdm_spoly(h, g, O, K) + if phantom: + return h, hp + return h + + +def sdm_nf_buchberger_reduced(f, G, O, K): + r""" + Compute a reduced normal form of ``f`` with respect to ``G`` and order ``O``. + + The ground field is assumed to be ``K``, and monomials ordered according to + ``O``. + + In contrast to weak normal forms, reduced normal forms *are* unique, but + their computation is more expensive. + + This is the standard Buchberger algorithm for computing reduced normal forms + with respect to *global* monomial orders [SCA, algorithm 1.6.11]. + + The ``pantom`` option is not supported, so this normal form cannot be used + as a normal form for the "extended" groebner algorithm. + """ + h = sdm_zero() + g = f + while g: + g = sdm_nf_buchberger(g, G, O, K) + if g: + h = sdm_add(h, [sdm_LT(g)], O, K) + g = g[1:] + return h + + +def sdm_groebner(G, NF, O, K, extended=False): + """ + Compute a minimal standard basis of ``G`` with respect to order ``O``. + + The algorithm uses a normal form ``NF``, for example ``sdm_nf_mora``. + The ground field is assumed to be ``K``, and monomials ordered according + to ``O``. + + Let `N` denote the submodule generated by elements of `G`. A standard + basis for `N` is a subset `S` of `N`, such that `in(S) = in(N)`, where for + any subset `X` of `F`, `in(X)` denotes the submodule generated by the + initial forms of elements of `X`. [SCA, defn 2.3.2] + + A standard basis is called minimal if no subset of it is a standard basis. + + One may show that standard bases are always generating sets. + + Minimal standard bases are not unique. This algorithm computes a + deterministic result, depending on the particular order of `G`. + + If ``extended=True``, also compute the transition matrix from the initial + generators to the groebner basis. That is, return a list of coefficient + vectors, expressing the elements of the groebner basis in terms of the + elements of ``G``. + + This functions implements the "sugar" strategy, see + + Giovini et al: "One sugar cube, please" OR Selection strategies in + Buchberger algorithm. + """ + + # The critical pair set. + # A critical pair is stored as (i, j, s, t) where (i, j) defines the pair + # (by indexing S), s is the sugar of the pair, and t is the lcm of their + # leading monomials. + P = [] + + # The eventual standard basis. + S = [] + Sugars = [] + + def Ssugar(i, j): + """Compute the sugar of the S-poly corresponding to (i, j).""" + LMi = sdm_LM(S[i]) + LMj = sdm_LM(S[j]) + return max(Sugars[i] - sdm_monomial_deg(LMi), + Sugars[j] - sdm_monomial_deg(LMj)) \ + + sdm_monomial_deg(sdm_monomial_lcm(LMi, LMj)) + + ourkey = lambda p: (p[2], O(p[3]), p[1]) + + def update(f, sugar, P): + """Add f with sugar ``sugar`` to S, update P.""" + if not f: + return P + k = len(S) + S.append(f) + Sugars.append(sugar) + + LMf = sdm_LM(f) + + def removethis(pair): + i, j, s, t = pair + if LMf[0] != t[0]: + return False + tik = sdm_monomial_lcm(LMf, sdm_LM(S[i])) + tjk = sdm_monomial_lcm(LMf, sdm_LM(S[j])) + return tik != t and tjk != t and sdm_monomial_divides(tik, t) and \ + sdm_monomial_divides(tjk, t) + # apply the chain criterion + P = [p for p in P if not removethis(p)] + + # new-pair set + N = [(i, k, Ssugar(i, k), sdm_monomial_lcm(LMf, sdm_LM(S[i]))) + for i in range(k) if LMf[0] == sdm_LM(S[i])[0]] + # TODO apply the product criterion? + N.sort(key=ourkey) + remove = set() + for i, p in enumerate(N): + for j in range(i + 1, len(N)): + if sdm_monomial_divides(p[3], N[j][3]): + remove.add(j) + + # TODO mergesort? + P.extend(reversed([p for i, p in enumerate(N) if i not in remove])) + P.sort(key=ourkey, reverse=True) + # NOTE reverse-sort, because we want to pop from the end + return P + + # Figure out the number of generators in the ground ring. + try: + # NOTE: we look for the first non-zero vector, take its first monomial + # the number of generators in the ring is one less than the length + # (since the zeroth entry is for the module generators) + numgens = len(next(x[0] for x in G if x)[0]) - 1 + except StopIteration: + # No non-zero elements in G ... + if extended: + return [], [] + return [] + + # This list will store expressions of the elements of S in terms of the + # initial generators + coefficients = [] + + # First add all the elements of G to S + for i, f in enumerate(G): + P = update(f, sdm_deg(f), P) + if extended and f: + coefficients.append(sdm_from_dict({(i,) + (0,)*numgens: K(1)}, O)) + + # Now carry out the buchberger algorithm. + while P: + i, j, s, t = P.pop() + f, g = S[i], S[j] + if extended: + sp, coeff = sdm_spoly(f, g, O, K, + phantom=(coefficients[i], coefficients[j])) + h, hcoeff = NF(sp, S, O, K, phantom=(coeff, coefficients)) + if h: + coefficients.append(hcoeff) + else: + h = NF(sdm_spoly(f, g, O, K), S, O, K) + P = update(h, Ssugar(i, j), P) + + # Finally interreduce the standard basis. + # (TODO again, better data structures) + S = {(tuple(f), i) for i, f in enumerate(S)} + for (a, ai), (b, bi) in permutations(S, 2): + A = sdm_LM(a) + B = sdm_LM(b) + if sdm_monomial_divides(A, B) and (b, bi) in S and (a, ai) in S: + S.remove((b, bi)) + + L = sorted(((list(f), i) for f, i in S), key=lambda p: O(sdm_LM(p[0])), + reverse=True) + res = [x[0] for x in L] + if extended: + return res, [coefficients[i] for _, i in L] + return res diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domainmatrix.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domainmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..c0ccaaa4cb96e0c49da58d8e9128c1b6fa551ade --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domainmatrix.py @@ -0,0 +1,12 @@ +""" +Stub module to expose DomainMatrix which has now moved to +sympy.polys.matrices package. It should now be imported as: + + >>> from sympy.polys.matrices import DomainMatrix + +This module might be removed in future. +""" + +from sympy.polys.matrices.domainmatrix import DomainMatrix + +__all__ = ['DomainMatrix'] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..c6839b4494afd0ee0c0ecd9ddee65d1afbdc6b53 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/__init__.py @@ -0,0 +1,57 @@ +"""Implementation of mathematical domains. """ + +__all__ = [ + 'Domain', 'FiniteField', 'IntegerRing', 'RationalField', 'RealField', + 'ComplexField', 'AlgebraicField', 'PolynomialRing', 'FractionField', + 'ExpressionDomain', 'PythonRational', + + 'GF', 'FF', 'ZZ', 'QQ', 'ZZ_I', 'QQ_I', 'RR', 'CC', 'EX', 'EXRAW', +] + +from .domain import Domain +from .finitefield import FiniteField, FF, GF +from .integerring import IntegerRing, ZZ +from .rationalfield import RationalField, QQ +from .algebraicfield import AlgebraicField +from .gaussiandomains import ZZ_I, QQ_I +from .realfield import RealField, RR +from .complexfield import ComplexField, CC +from .polynomialring import PolynomialRing +from .fractionfield import FractionField +from .expressiondomain import ExpressionDomain, EX +from .expressionrawdomain import EXRAW +from .pythonrational import PythonRational + + +# This is imported purely for backwards compatibility because some parts of +# the codebase used to import this from here and it's possible that downstream +# does as well: +from sympy.external.gmpy import GROUND_TYPES # noqa: F401 + +# +# The rest of these are obsolete and provided only for backwards +# compatibility: +# + +from .pythonfinitefield import PythonFiniteField +from .gmpyfinitefield import GMPYFiniteField +from .pythonintegerring import PythonIntegerRing +from .gmpyintegerring import GMPYIntegerRing +from .pythonrationalfield import PythonRationalField +from .gmpyrationalfield import GMPYRationalField + +FF_python = PythonFiniteField +FF_gmpy = GMPYFiniteField + +ZZ_python = PythonIntegerRing +ZZ_gmpy = GMPYIntegerRing + +QQ_python = PythonRationalField +QQ_gmpy = GMPYRationalField + +__all__.extend(( + 'PythonFiniteField', 'GMPYFiniteField', 'PythonIntegerRing', + 'GMPYIntegerRing', 'PythonRational', 'GMPYRationalField', + + 'FF_python', 'FF_gmpy', 'ZZ_python', 'ZZ_gmpy', 'QQ_python', 'QQ_gmpy', +)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/__pycache__/__init__.cpython-310.pyc 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:class:`AlgebraicField` class. """ + + +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.core.singleton import S +from sympy.core.symbol import Dummy, symbols +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.field import Field +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyclasses import ANP +from sympy.polys.polyerrors import CoercionFailed, DomainError, NotAlgebraic, IsomorphismFailed +from sympy.utilities import public + +@public +class AlgebraicField(Field, CharacteristicZero, SimpleDomain): + r"""Algebraic number field :ref:`QQ(a)` + + A :ref:`QQ(a)` domain represents an `algebraic number field`_ + `\mathbb{Q}(a)` as a :py:class:`~.Domain` in the domain system (see + :ref:`polys-domainsintro`). + + A :py:class:`~.Poly` created from an expression involving `algebraic + numbers`_ will treat the algebraic numbers as generators if the generators + argument is not specified. + + >>> from sympy import Poly, Symbol, sqrt + >>> x = Symbol('x') + >>> Poly(x**2 + sqrt(2)) + Poly(x**2 + (sqrt(2)), x, sqrt(2), domain='ZZ') + + That is a multivariate polynomial with ``sqrt(2)`` treated as one of the + generators (variables). If the generators are explicitly specified then + ``sqrt(2)`` will be considered to be a coefficient but by default the + :ref:`EX` domain is used. To make a :py:class:`~.Poly` with a :ref:`QQ(a)` + domain the argument ``extension=True`` can be given. + + >>> Poly(x**2 + sqrt(2), x) + Poly(x**2 + sqrt(2), x, domain='EX') + >>> Poly(x**2 + sqrt(2), x, extension=True) + Poly(x**2 + sqrt(2), x, domain='QQ') + + A generator of the algebraic field extension can also be specified + explicitly which is particularly useful if the coefficients are all + rational but an extension field is needed (e.g. to factor the + polynomial). + + >>> Poly(x**2 + 1) + Poly(x**2 + 1, x, domain='ZZ') + >>> Poly(x**2 + 1, extension=sqrt(2)) + Poly(x**2 + 1, x, domain='QQ') + + It is possible to factorise a polynomial over a :ref:`QQ(a)` domain using + the ``extension`` argument to :py:func:`~.factor` or by specifying the domain + explicitly. + + >>> from sympy import factor, QQ + >>> factor(x**2 - 2) + x**2 - 2 + >>> factor(x**2 - 2, extension=sqrt(2)) + (x - sqrt(2))*(x + sqrt(2)) + >>> factor(x**2 - 2, domain='QQ') + (x - sqrt(2))*(x + sqrt(2)) + >>> factor(x**2 - 2, domain=QQ.algebraic_field(sqrt(2))) + (x - sqrt(2))*(x + sqrt(2)) + + The ``extension=True`` argument can be used but will only create an + extension that contains the coefficients which is usually not enough to + factorise the polynomial. + + >>> p = x**3 + sqrt(2)*x**2 - 2*x - 2*sqrt(2) + >>> factor(p) # treats sqrt(2) as a symbol + (x + sqrt(2))*(x**2 - 2) + >>> factor(p, extension=True) + (x - sqrt(2))*(x + sqrt(2))**2 + >>> factor(x**2 - 2, extension=True) # all rational coefficients + x**2 - 2 + + It is also possible to use :ref:`QQ(a)` with the :py:func:`~.cancel` + and :py:func:`~.gcd` functions. + + >>> from sympy import cancel, gcd + >>> cancel((x**2 - 2)/(x - sqrt(2))) + (x**2 - 2)/(x - sqrt(2)) + >>> cancel((x**2 - 2)/(x - sqrt(2)), extension=sqrt(2)) + x + sqrt(2) + >>> gcd(x**2 - 2, x - sqrt(2)) + 1 + >>> gcd(x**2 - 2, x - sqrt(2), extension=sqrt(2)) + x - sqrt(2) + + When using the domain directly :ref:`QQ(a)` can be used as a constructor + to create instances which then support the operations ``+,-,*,**,/``. The + :py:meth:`~.Domain.algebraic_field` method is used to construct a + particular :ref:`QQ(a)` domain. The :py:meth:`~.Domain.from_sympy` method + can be used to create domain elements from normal SymPy expressions. + + >>> K = QQ.algebraic_field(sqrt(2)) + >>> K + QQ + >>> xk = K.from_sympy(3 + 4*sqrt(2)) + >>> xk # doctest: +SKIP + ANP([4, 3], [1, 0, -2], QQ) + + Elements of :ref:`QQ(a)` are instances of :py:class:`~.ANP` which have + limited printing support. The raw display shows the internal + representation of the element as the list ``[4, 3]`` representing the + coefficients of ``1`` and ``sqrt(2)`` for this element in the form + ``a * sqrt(2) + b * 1`` where ``a`` and ``b`` are elements of :ref:`QQ`. + The minimal polynomial for the generator ``(x**2 - 2)`` is also shown in + the :ref:`dup-representation` as the list ``[1, 0, -2]``. We can use + :py:meth:`~.Domain.to_sympy` to get a better printed form for the + elements and to see the results of operations. + + >>> xk = K.from_sympy(3 + 4*sqrt(2)) + >>> yk = K.from_sympy(2 + 3*sqrt(2)) + >>> xk * yk # doctest: +SKIP + ANP([17, 30], [1, 0, -2], QQ) + >>> K.to_sympy(xk * yk) + 17*sqrt(2) + 30 + >>> K.to_sympy(xk + yk) + 5 + 7*sqrt(2) + >>> K.to_sympy(xk ** 2) + 24*sqrt(2) + 41 + >>> K.to_sympy(xk / yk) + sqrt(2)/14 + 9/7 + + Any expression representing an algebraic number can be used to generate + a :ref:`QQ(a)` domain provided its `minimal polynomial`_ can be computed. + The function :py:func:`~.minpoly` function is used for this. + + >>> from sympy import exp, I, pi, minpoly + >>> g = exp(2*I*pi/3) + >>> g + exp(2*I*pi/3) + >>> g.is_algebraic + True + >>> minpoly(g, x) + x**2 + x + 1 + >>> factor(x**3 - 1, extension=g) + (x - 1)*(x - exp(2*I*pi/3))*(x + 1 + exp(2*I*pi/3)) + + It is also possible to make an algebraic field from multiple extension + elements. + + >>> K = QQ.algebraic_field(sqrt(2), sqrt(3)) + >>> K + QQ + >>> p = x**4 - 5*x**2 + 6 + >>> factor(p) + (x**2 - 3)*(x**2 - 2) + >>> factor(p, domain=K) + (x - sqrt(2))*(x + sqrt(2))*(x - sqrt(3))*(x + sqrt(3)) + >>> factor(p, extension=[sqrt(2), sqrt(3)]) + (x - sqrt(2))*(x + sqrt(2))*(x - sqrt(3))*(x + sqrt(3)) + + Multiple extension elements are always combined together to make a single + `primitive element`_. In the case of ``[sqrt(2), sqrt(3)]`` the primitive + element chosen is ``sqrt(2) + sqrt(3)`` which is why the domain displays + as ``QQ``. The minimal polynomial for the primitive + element is computed using the :py:func:`~.primitive_element` function. + + >>> from sympy import primitive_element + >>> primitive_element([sqrt(2), sqrt(3)], x) + (x**4 - 10*x**2 + 1, [1, 1]) + >>> minpoly(sqrt(2) + sqrt(3), x) + x**4 - 10*x**2 + 1 + + The extension elements that generate the domain can be accessed from the + domain using the :py:attr:`~.ext` and :py:attr:`~.orig_ext` attributes as + instances of :py:class:`~.AlgebraicNumber`. The minimal polynomial for + the primitive element as a :py:class:`~.DMP` instance is available as + :py:attr:`~.mod`. + + >>> K = QQ.algebraic_field(sqrt(2), sqrt(3)) + >>> K + QQ + >>> K.ext + sqrt(2) + sqrt(3) + >>> K.orig_ext + (sqrt(2), sqrt(3)) + >>> K.mod # doctest: +SKIP + DMP_Python([1, 0, -10, 0, 1], QQ) + + The `discriminant`_ of the field can be obtained from the + :py:meth:`~.discriminant` method, and an `integral basis`_ from the + :py:meth:`~.integral_basis` method. The latter returns a list of + :py:class:`~.ANP` instances by default, but can be made to return instances + of :py:class:`~.Expr` or :py:class:`~.AlgebraicNumber` by passing a ``fmt`` + argument. The maximal order, or ring of integers, of the field can also be + obtained from the :py:meth:`~.maximal_order` method, as a + :py:class:`~sympy.polys.numberfields.modules.Submodule`. + + >>> zeta5 = exp(2*I*pi/5) + >>> K = QQ.algebraic_field(zeta5) + >>> K + QQ + >>> K.discriminant() + 125 + >>> K = QQ.algebraic_field(sqrt(5)) + >>> K + QQ + >>> K.integral_basis(fmt='sympy') + [1, 1/2 + sqrt(5)/2] + >>> K.maximal_order() + Submodule[[2, 0], [1, 1]]/2 + + The factorization of a rational prime into prime ideals of the field is + computed by the :py:meth:`~.primes_above` method, which returns a list + of :py:class:`~sympy.polys.numberfields.primes.PrimeIdeal` instances. + + >>> zeta7 = exp(2*I*pi/7) + >>> K = QQ.algebraic_field(zeta7) + >>> K + QQ + >>> K.primes_above(11) + [(11, _x**3 + 5*_x**2 + 4*_x - 1), (11, _x**3 - 4*_x**2 - 5*_x - 1)] + + The Galois group of the Galois closure of the field can be computed (when + the minimal polynomial of the field is of sufficiently small degree). + + >>> K.galois_group(by_name=True)[0] + S6TransitiveSubgroups.C6 + + Notes + ===== + + It is not currently possible to generate an algebraic extension over any + domain other than :ref:`QQ`. Ideally it would be possible to generate + extensions like ``QQ(x)(sqrt(x**2 - 2))``. This is equivalent to the + quotient ring ``QQ(x)[y]/(y**2 - x**2 + 2)`` and there are two + implementations of this kind of quotient ring/extension in the + :py:class:`~.QuotientRing` and :py:class:`~.MonogenicFiniteExtension` + classes. Each of those implementations needs some work to make them fully + usable though. + + .. _algebraic number field: https://en.wikipedia.org/wiki/Algebraic_number_field + .. _algebraic numbers: https://en.wikipedia.org/wiki/Algebraic_number + .. _discriminant: https://en.wikipedia.org/wiki/Discriminant_of_an_algebraic_number_field + .. _integral basis: https://en.wikipedia.org/wiki/Algebraic_number_field#Integral_basis + .. _minimal polynomial: https://en.wikipedia.org/wiki/Minimal_polynomial_(field_theory) + .. _primitive element: https://en.wikipedia.org/wiki/Primitive_element_theorem + """ + + dtype = ANP + + is_AlgebraicField = is_Algebraic = True + is_Numerical = True + + has_assoc_Ring = False + has_assoc_Field = True + + def __init__(self, dom, *ext, alias=None): + r""" + Parameters + ========== + + dom : :py:class:`~.Domain` + The base field over which this is an extension field. + Currently only :ref:`QQ` is accepted. + + *ext : One or more :py:class:`~.Expr` + Generators of the extension. These should be expressions that are + algebraic over `\mathbb{Q}`. + + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + If provided, this will be used as the alias symbol for the + primitive element of the :py:class:`~.AlgebraicField`. + If ``None``, while ``ext`` consists of exactly one + :py:class:`~.AlgebraicNumber`, its alias (if any) will be used. + """ + if not dom.is_QQ: + raise DomainError("ground domain must be a rational field") + + from sympy.polys.numberfields import to_number_field + if len(ext) == 1 and isinstance(ext[0], tuple): + orig_ext = ext[0][1:] + else: + orig_ext = ext + + if alias is None and len(ext) == 1: + alias = getattr(ext[0], 'alias', None) + + self.orig_ext = orig_ext + """ + Original elements given to generate the extension. + + >>> from sympy import QQ, sqrt + >>> K = QQ.algebraic_field(sqrt(2), sqrt(3)) + >>> K.orig_ext + (sqrt(2), sqrt(3)) + """ + + self.ext = to_number_field(ext, alias=alias) + """ + Primitive element used for the extension. + + >>> from sympy import QQ, sqrt + >>> K = QQ.algebraic_field(sqrt(2), sqrt(3)) + >>> K.ext + sqrt(2) + sqrt(3) + """ + + self.mod = self.ext.minpoly.rep + """ + Minimal polynomial for the primitive element of the extension. + + >>> from sympy import QQ, sqrt + >>> K = QQ.algebraic_field(sqrt(2)) + >>> K.mod + DMP([1, 0, -2], QQ) + """ + + self.domain = self.dom = dom + + self.ngens = 1 + self.symbols = self.gens = (self.ext,) + self.unit = self([dom(1), dom(0)]) + + self.zero = self.dtype.zero(self.mod.to_list(), dom) + self.one = self.dtype.one(self.mod.to_list(), dom) + + self._maximal_order = None + self._discriminant = None + self._nilradicals_mod_p = {} + + def new(self, element): + return self.dtype(element, self.mod.to_list(), self.dom) + + def __str__(self): + return str(self.dom) + '<' + str(self.ext) + '>' + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype, self.dom, self.ext)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if isinstance(other, AlgebraicField): + return self.dtype == other.dtype and self.ext == other.ext + else: + return NotImplemented + + def algebraic_field(self, *extension, alias=None): + r"""Returns an algebraic field, i.e. `\mathbb{Q}(\alpha, \ldots)`. """ + return AlgebraicField(self.dom, *((self.ext,) + extension), alias=alias) + + def to_alg_num(self, a): + """Convert ``a`` of ``dtype`` to an :py:class:`~.AlgebraicNumber`. """ + return self.ext.field_element(a) + + def to_sympy(self, a): + """Convert ``a`` of ``dtype`` to a SymPy object. """ + # Precompute a converter to be reused: + if not hasattr(self, '_converter'): + self._converter = _make_converter(self) + + return self._converter(a) + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + try: + return self([self.dom.from_sympy(a)]) + except CoercionFailed: + pass + + from sympy.polys.numberfields import to_number_field + + try: + return self(to_number_field(a, self.ext).native_coeffs()) + except (NotAlgebraic, IsomorphismFailed): + raise CoercionFailed( + "%s is not a valid algebraic number in %s" % (a, self)) + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_QQ(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def get_ring(self): + """Returns a ring associated with ``self``. """ + raise DomainError('there is no ring associated with %s' % self) + + def is_positive(self, a): + """Returns True if ``a`` is positive. """ + return self.dom.is_positive(a.LC()) + + def is_negative(self, a): + """Returns True if ``a`` is negative. """ + return self.dom.is_negative(a.LC()) + + def is_nonpositive(self, a): + """Returns True if ``a`` is non-positive. """ + return self.dom.is_nonpositive(a.LC()) + + def is_nonnegative(self, a): + """Returns True if ``a`` is non-negative. """ + return self.dom.is_nonnegative(a.LC()) + + def numer(self, a): + """Returns numerator of ``a``. """ + return a + + def denom(self, a): + """Returns denominator of ``a``. """ + return self.one + + def from_AlgebraicField(K1, a, K0): + """Convert AlgebraicField element 'a' to another AlgebraicField """ + return K1.from_sympy(K0.to_sympy(a)) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a GaussianInteger element 'a' to ``dtype``. """ + return K1.from_sympy(K0.to_sympy(a)) + + def from_GaussianRationalField(K1, a, K0): + """Convert a GaussianRational element 'a' to ``dtype``. """ + return K1.from_sympy(K0.to_sympy(a)) + + def _do_round_two(self): + from sympy.polys.numberfields.basis import round_two + ZK, dK = round_two(self, radicals=self._nilradicals_mod_p) + self._maximal_order = ZK + self._discriminant = dK + + def maximal_order(self): + """ + Compute the maximal order, or ring of integers, of the field. + + Returns + ======= + + :py:class:`~sympy.polys.numberfields.modules.Submodule`. + + See Also + ======== + + integral_basis + + """ + if self._maximal_order is None: + self._do_round_two() + return self._maximal_order + + def integral_basis(self, fmt=None): + r""" + Get an integral basis for the field. + + Parameters + ========== + + fmt : str, None, optional (default=None) + If ``None``, return a list of :py:class:`~.ANP` instances. + If ``"sympy"``, convert each element of the list to an + :py:class:`~.Expr`, using ``self.to_sympy()``. + If ``"alg"``, convert each element of the list to an + :py:class:`~.AlgebraicNumber`, using ``self.to_alg_num()``. + + Examples + ======== + + >>> from sympy import QQ, AlgebraicNumber, sqrt + >>> alpha = AlgebraicNumber(sqrt(5), alias='alpha') + >>> k = QQ.algebraic_field(alpha) + >>> B0 = k.integral_basis() + >>> B1 = k.integral_basis(fmt='sympy') + >>> B2 = k.integral_basis(fmt='alg') + >>> print(B0[1]) # doctest: +SKIP + ANP([mpq(1,2), mpq(1,2)], [mpq(1,1), mpq(0,1), mpq(-5,1)], QQ) + >>> print(B1[1]) + 1/2 + alpha/2 + >>> print(B2[1]) + alpha/2 + 1/2 + + In the last two cases we get legible expressions, which print somewhat + differently because of the different types involved: + + >>> print(type(B1[1])) + + >>> print(type(B2[1])) + + + See Also + ======== + + to_sympy + to_alg_num + maximal_order + """ + ZK = self.maximal_order() + M = ZK.QQ_matrix + n = M.shape[1] + B = [self.new(list(reversed(M[:, j].flat()))) for j in range(n)] + if fmt == 'sympy': + return [self.to_sympy(b) for b in B] + elif fmt == 'alg': + return [self.to_alg_num(b) for b in B] + return B + + def discriminant(self): + """Get the discriminant of the field.""" + if self._discriminant is None: + self._do_round_two() + return self._discriminant + + def primes_above(self, p): + """Compute the prime ideals lying above a given rational prime *p*.""" + from sympy.polys.numberfields.primes import prime_decomp + ZK = self.maximal_order() + dK = self.discriminant() + rad = self._nilradicals_mod_p.get(p) + return prime_decomp(p, ZK=ZK, dK=dK, radical=rad) + + def galois_group(self, by_name=False, max_tries=30, randomize=False): + """ + Compute the Galois group of the Galois closure of this field. + + Examples + ======== + + If the field is Galois, the order of the group will equal the degree + of the field: + + >>> from sympy import QQ + >>> from sympy.abc import x + >>> k = QQ.alg_field_from_poly(x**4 + 1) + >>> G, _ = k.galois_group() + >>> G.order() + 4 + + If the field is not Galois, then its Galois closure is a proper + extension, and the order of the Galois group will be greater than the + degree of the field: + + >>> k = QQ.alg_field_from_poly(x**4 - 2) + >>> G, _ = k.galois_group() + >>> G.order() + 8 + + See Also + ======== + + sympy.polys.numberfields.galoisgroups.galois_group + + """ + return self.ext.minpoly_of_element().galois_group( + by_name=by_name, max_tries=max_tries, randomize=randomize) + + +def _make_converter(K): + """Construct the converter to convert back to Expr""" + # Precompute the effect of converting to SymPy and expanding expressions + # like (sqrt(2) + sqrt(3))**2. Asking Expr to do the expansion on every + # conversion from K to Expr is slow. Here we compute the expansions for + # each power of the generator and collect together the resulting algebraic + # terms and the rational coefficients into a matrix. + + ext = K.ext.as_expr() + todom = K.dom.from_sympy + toexpr = K.dom.to_sympy + + if not ext.is_Add: + powers = [ext**n for n in range(K.mod.degree())] + else: + # primitive_element generates a QQ-linear combination of lower degree + # algebraic numbers to generate the higher degree extension e.g. + # QQ That means that we end up having high powers of low + # degree algebraic numbers that can be reduced. Here we will use the + # minimal polynomials of the algebraic numbers to reduce those powers + # before converting to Expr. + from sympy.polys.numberfields.minpoly import minpoly + + # Decompose ext as a linear combination of gens and make a symbol for + # each gen. + gens, coeffs = zip(*ext.as_coefficients_dict().items()) + syms = symbols(f'a:{len(gens)}', cls=Dummy) + sym2gen = dict(zip(syms, gens)) + + # Make a polynomial ring that can express ext and minpolys of all gens + # in terms of syms. + R = K.dom[syms] + monoms = [R.ring.monomial_basis(i) for i in range(R.ngens)] + ext_dict = {m: todom(c) for m, c in zip(monoms, coeffs)} + ext_poly = R.ring.from_dict(ext_dict) + minpolys = [R.from_sympy(minpoly(g, s)) for s, g in sym2gen.items()] + + # Compute all powers of ext_poly reduced modulo minpolys + powers = [R.one, ext_poly] + for n in range(2, K.mod.degree()): + ext_poly_n = (powers[-1] * ext_poly).rem(minpolys) + powers.append(ext_poly_n) + + # Convert the powers back to Expr. This will recombine some things like + # sqrt(2)*sqrt(3) -> sqrt(6). + powers = [p.as_expr().xreplace(sym2gen) for p in powers] + + # This also expands some rational powers + powers = [p.expand() for p in powers] + + # Collect the rational coefficients and algebraic Expr that can + # map the ANP coefficients into an expanded SymPy expression + terms = [dict(t.as_coeff_Mul()[::-1] for t in Add.make_args(p)) for p in powers] + algebraics = set().union(*terms) + matrix = [[todom(t.get(a, S.Zero)) for t in terms] for a in algebraics] + + # Create a function to do the conversion efficiently: + + def converter(a): + """Convert a to Expr using converter""" + ai = a.to_list()[::-1] + coeffs_dom = [sum(mij*aj for mij, aj in zip(mi, ai)) for mi in matrix] + coeffs_sympy = [toexpr(c) for c in coeffs_dom] + res = Add(*(Mul(c, a) for c, a in zip(coeffs_sympy, algebraics))) + return res + + return converter diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/characteristiczero.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/characteristiczero.py new file mode 100644 index 0000000000000000000000000000000000000000..755a354bea9594b9e8f73256c448b3debae037b2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/characteristiczero.py @@ -0,0 +1,15 @@ +"""Implementation of :class:`CharacteristicZero` class. """ + + +from sympy.polys.domains.domain import Domain +from sympy.utilities import public + +@public +class CharacteristicZero(Domain): + """Domain that has infinite number of elements. """ + + has_CharacteristicZero = True + + def characteristic(self): + """Return the characteristic of this domain. """ + return 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/complexfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/complexfield.py new file mode 100644 index 0000000000000000000000000000000000000000..69f0bff2c1b311a150add88d5a1f146ea7b1726a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/complexfield.py @@ -0,0 +1,198 @@ +"""Implementation of :class:`ComplexField` class. """ + + +from sympy.external.gmpy import SYMPY_INTS +from sympy.core.numbers import Float, I +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.field import Field +from sympy.polys.domains.gaussiandomains import QQ_I +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyerrors import DomainError, CoercionFailed +from sympy.utilities import public + +from mpmath import MPContext + + +@public +class ComplexField(Field, CharacteristicZero, SimpleDomain): + """Complex numbers up to the given precision. """ + + rep = 'CC' + + is_ComplexField = is_CC = True + + is_Exact = False + is_Numerical = True + + has_assoc_Ring = False + has_assoc_Field = True + + _default_precision = 53 + + @property + def has_default_precision(self): + return self.precision == self._default_precision + + @property + def precision(self): + return self._context.prec + + @property + def dps(self): + return self._context.dps + + @property + def tolerance(self): + return self._tolerance + + def __init__(self, prec=None, dps=None, tol=None): + # XXX: The tolerance parameter is ignored but is kept for backward + # compatibility for now. + + context = MPContext() + + if prec is None and dps is None: + context.prec = self._default_precision + elif dps is None: + context.prec = prec + elif prec is None: + context.dps = dps + else: + raise TypeError("Cannot set both prec and dps") + + self._context = context + + self._dtype = context.mpc + self.zero = self.dtype(0) + self.one = self.dtype(1) + + # XXX: Neither of these is actually used anywhere. + self._max_denom = max(2**context.prec // 200, 99) + self._tolerance = self.one / self._max_denom + + @property + def tp(self): + # XXX: Domain treats tp as an alias of dtype. Here we need two separate + # things: dtype is a callable to make/convert instances. We use tp with + # isinstance to check if an object is an instance of the domain + # already. + return self._dtype + + def dtype(self, x, y=0): + # XXX: This is needed because mpmath does not recognise fmpz. + # It might be better to add conversion routines to mpmath and if that + # happens then this can be removed. + if isinstance(x, SYMPY_INTS): + x = int(x) + if isinstance(y, SYMPY_INTS): + y = int(y) + return self._dtype(x, y) + + def __eq__(self, other): + return isinstance(other, ComplexField) and self.precision == other.precision + + def __hash__(self): + return hash((self.__class__.__name__, self._dtype, self.precision)) + + def to_sympy(self, element): + """Convert ``element`` to SymPy number. """ + return Float(element.real, self.dps) + I*Float(element.imag, self.dps) + + def from_sympy(self, expr): + """Convert SymPy's number to ``dtype``. """ + number = expr.evalf(n=self.dps) + real, imag = number.as_real_imag() + + if real.is_Number and imag.is_Number: + return self.dtype(real, imag) + else: + raise CoercionFailed("expected complex number, got %s" % expr) + + def from_ZZ(self, element, base): + return self.dtype(element) + + def from_ZZ_gmpy(self, element, base): + return self.dtype(int(element)) + + def from_ZZ_python(self, element, base): + return self.dtype(element) + + def from_QQ(self, element, base): + return self.dtype(int(element.numerator)) / int(element.denominator) + + def from_QQ_python(self, element, base): + return self.dtype(element.numerator) / element.denominator + + def from_QQ_gmpy(self, element, base): + return self.dtype(int(element.numerator)) / int(element.denominator) + + def from_GaussianIntegerRing(self, element, base): + return self.dtype(int(element.x), int(element.y)) + + def from_GaussianRationalField(self, element, base): + x = element.x + y = element.y + return (self.dtype(int(x.numerator)) / int(x.denominator) + + self.dtype(0, int(y.numerator)) / int(y.denominator)) + + def from_AlgebraicField(self, element, base): + return self.from_sympy(base.to_sympy(element).evalf(self.dps)) + + def from_RealField(self, element, base): + return self.dtype(element) + + def from_ComplexField(self, element, base): + return self.dtype(element) + + def get_ring(self): + """Returns a ring associated with ``self``. """ + raise DomainError("there is no ring associated with %s" % self) + + def get_exact(self): + """Returns an exact domain associated with ``self``. """ + return QQ_I + + def is_negative(self, element): + """Returns ``False`` for any ``ComplexElement``. """ + return False + + def is_positive(self, element): + """Returns ``False`` for any ``ComplexElement``. """ + return False + + def is_nonnegative(self, element): + """Returns ``False`` for any ``ComplexElement``. """ + return False + + def is_nonpositive(self, element): + """Returns ``False`` for any ``ComplexElement``. """ + return False + + def gcd(self, a, b): + """Returns GCD of ``a`` and ``b``. """ + return self.one + + def lcm(self, a, b): + """Returns LCM of ``a`` and ``b``. """ + return a*b + + def almosteq(self, a, b, tolerance=None): + """Check if ``a`` and ``b`` are almost equal. """ + return self._context.almosteq(a, b, tolerance) + + def is_square(self, a): + """Returns ``True``. Every complex number has a complex square root.""" + return True + + def exsqrt(self, a): + r"""Returns the principal complex square root of ``a``. + + Explanation + =========== + The argument of the principal square root is always within + $(-\frac{\pi}{2}, \frac{\pi}{2}]$. The square root may be + slightly inaccurate due to floating point rounding error. + """ + return a ** 0.5 + +CC = ComplexField() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/compositedomain.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/compositedomain.py new file mode 100644 index 0000000000000000000000000000000000000000..a8f63ba7bb86b1d69493b77bfa8c7f33652adbbf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/compositedomain.py @@ -0,0 +1,52 @@ +"""Implementation of :class:`CompositeDomain` class. """ + + +from sympy.polys.domains.domain import Domain +from sympy.polys.polyerrors import GeneratorsError + +from sympy.utilities import public + +@public +class CompositeDomain(Domain): + """Base class for composite domains, e.g. ZZ[x], ZZ(X). """ + + is_Composite = True + + gens, ngens, symbols, domain = [None]*4 + + def inject(self, *symbols): + """Inject generators into this domain. """ + if not (set(self.symbols) & set(symbols)): + return self.__class__(self.domain, self.symbols + symbols, self.order) + else: + raise GeneratorsError("common generators in %s and %s" % (self.symbols, symbols)) + + def drop(self, *symbols): + """Drop generators from this domain. """ + symset = set(symbols) + newsyms = tuple(s for s in self.symbols if s not in symset) + domain = self.domain.drop(*symbols) + if not newsyms: + return domain + else: + return self.__class__(domain, newsyms, self.order) + + def set_domain(self, domain): + """Set the ground domain of this domain. """ + return self.__class__(domain, self.symbols, self.order) + + @property + def is_Exact(self): + """Returns ``True`` if this domain is exact. """ + return self.domain.is_Exact + + def get_exact(self): + """Returns an exact version of this domain. """ + return self.set_domain(self.domain.get_exact()) + + @property + def has_CharacteristicZero(self): + return self.domain.has_CharacteristicZero + + def characteristic(self): + return self.domain.characteristic() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domain.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domain.py new file mode 100644 index 0000000000000000000000000000000000000000..1d7fc1eac6184601c199fb6724a11e92346789f1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domain.py @@ -0,0 +1,1382 @@ +"""Implementation of :class:`Domain` class. """ + +from __future__ import annotations +from typing import Any + +from sympy.core.numbers import AlgebraicNumber +from sympy.core import Basic, sympify +from sympy.core.sorting import ordered +from sympy.external.gmpy import GROUND_TYPES +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.orderings import lex +from sympy.polys.polyerrors import UnificationFailed, CoercionFailed, DomainError +from sympy.polys.polyutils import _unify_gens, _not_a_coeff +from sympy.utilities import public +from sympy.utilities.iterables import is_sequence + + +@public +class Domain: + """Superclass for all domains in the polys domains system. + + See :ref:`polys-domainsintro` for an introductory explanation of the + domains system. + + The :py:class:`~.Domain` class is an abstract base class for all of the + concrete domain types. There are many different :py:class:`~.Domain` + subclasses each of which has an associated ``dtype`` which is a class + representing the elements of the domain. The coefficients of a + :py:class:`~.Poly` are elements of a domain which must be a subclass of + :py:class:`~.Domain`. + + Examples + ======== + + The most common example domains are the integers :ref:`ZZ` and the + rationals :ref:`QQ`. + + >>> from sympy import Poly, symbols, Domain + >>> x, y = symbols('x, y') + >>> p = Poly(x**2 + y) + >>> p + Poly(x**2 + y, x, y, domain='ZZ') + >>> p.domain + ZZ + >>> isinstance(p.domain, Domain) + True + >>> Poly(x**2 + y/2) + Poly(x**2 + 1/2*y, x, y, domain='QQ') + + The domains can be used directly in which case the domain object e.g. + (:ref:`ZZ` or :ref:`QQ`) can be used as a constructor for elements of + ``dtype``. + + >>> from sympy import ZZ, QQ + >>> ZZ(2) + 2 + >>> ZZ.dtype # doctest: +SKIP + + >>> type(ZZ(2)) # doctest: +SKIP + + >>> QQ(1, 2) + 1/2 + >>> type(QQ(1, 2)) # doctest: +SKIP + + + The corresponding domain elements can be used with the arithmetic + operations ``+,-,*,**`` and depending on the domain some combination of + ``/,//,%`` might be usable. For example in :ref:`ZZ` both ``//`` (floor + division) and ``%`` (modulo division) can be used but ``/`` (true + division) cannot. Since :ref:`QQ` is a :py:class:`~.Field` its elements + can be used with ``/`` but ``//`` and ``%`` should not be used. Some + domains have a :py:meth:`~.Domain.gcd` method. + + >>> ZZ(2) + ZZ(3) + 5 + >>> ZZ(5) // ZZ(2) + 2 + >>> ZZ(5) % ZZ(2) + 1 + >>> QQ(1, 2) / QQ(2, 3) + 3/4 + >>> ZZ.gcd(ZZ(4), ZZ(2)) + 2 + >>> QQ.gcd(QQ(2,7), QQ(5,3)) + 1/21 + >>> ZZ.is_Field + False + >>> QQ.is_Field + True + + There are also many other domains including: + + 1. :ref:`GF(p)` for finite fields of prime order. + 2. :ref:`RR` for real (floating point) numbers. + 3. :ref:`CC` for complex (floating point) numbers. + 4. :ref:`QQ(a)` for algebraic number fields. + 5. :ref:`K[x]` for polynomial rings. + 6. :ref:`K(x)` for rational function fields. + 7. :ref:`EX` for arbitrary expressions. + + Each domain is represented by a domain object and also an implementation + class (``dtype``) for the elements of the domain. For example the + :ref:`K[x]` domains are represented by a domain object which is an + instance of :py:class:`~.PolynomialRing` and the elements are always + instances of :py:class:`~.PolyElement`. The implementation class + represents particular types of mathematical expressions in a way that is + more efficient than a normal SymPy expression which is of type + :py:class:`~.Expr`. The domain methods :py:meth:`~.Domain.from_sympy` and + :py:meth:`~.Domain.to_sympy` are used to convert from :py:class:`~.Expr` + to a domain element and vice versa. + + >>> from sympy import Symbol, ZZ, Expr + >>> x = Symbol('x') + >>> K = ZZ[x] # polynomial ring domain + >>> K + ZZ[x] + >>> type(K) # class of the domain + + >>> K.dtype # doctest: +SKIP + + >>> p_expr = x**2 + 1 # Expr + >>> p_expr + x**2 + 1 + >>> type(p_expr) + + >>> isinstance(p_expr, Expr) + True + >>> p_domain = K.from_sympy(p_expr) + >>> p_domain # domain element + x**2 + 1 + >>> type(p_domain) + + >>> K.to_sympy(p_domain) == p_expr + True + + The :py:meth:`~.Domain.convert_from` method is used to convert domain + elements from one domain to another. + + >>> from sympy import ZZ, QQ + >>> ez = ZZ(2) + >>> eq = QQ.convert_from(ez, ZZ) + >>> type(ez) # doctest: +SKIP + + >>> type(eq) # doctest: +SKIP + + + Elements from different domains should not be mixed in arithmetic or other + operations: they should be converted to a common domain first. The domain + method :py:meth:`~.Domain.unify` is used to find a domain that can + represent all the elements of two given domains. + + >>> from sympy import ZZ, QQ, symbols + >>> x, y = symbols('x, y') + >>> ZZ.unify(QQ) + QQ + >>> ZZ[x].unify(QQ) + QQ[x] + >>> ZZ[x].unify(QQ[y]) + QQ[x,y] + + If a domain is a :py:class:`~.Ring` then is might have an associated + :py:class:`~.Field` and vice versa. The :py:meth:`~.Domain.get_field` and + :py:meth:`~.Domain.get_ring` methods will find or create the associated + domain. + + >>> from sympy import ZZ, QQ, Symbol + >>> x = Symbol('x') + >>> ZZ.has_assoc_Field + True + >>> ZZ.get_field() + QQ + >>> QQ.has_assoc_Ring + True + >>> QQ.get_ring() + ZZ + >>> K = QQ[x] + >>> K + QQ[x] + >>> K.get_field() + QQ(x) + + See also + ======== + + DomainElement: abstract base class for domain elements + construct_domain: construct a minimal domain for some expressions + + """ + + dtype: type | None = None + """The type (class) of the elements of this :py:class:`~.Domain`: + + >>> from sympy import ZZ, QQ, Symbol + >>> ZZ.dtype + + >>> z = ZZ(2) + >>> z + 2 + >>> type(z) + + >>> type(z) == ZZ.dtype + True + + Every domain has an associated **dtype** ("datatype") which is the + class of the associated domain elements. + + See also + ======== + + of_type + """ + + zero: Any = None + """The zero element of the :py:class:`~.Domain`: + + >>> from sympy import QQ + >>> QQ.zero + 0 + >>> QQ.of_type(QQ.zero) + True + + See also + ======== + + of_type + one + """ + + one: Any = None + """The one element of the :py:class:`~.Domain`: + + >>> from sympy import QQ + >>> QQ.one + 1 + >>> QQ.of_type(QQ.one) + True + + See also + ======== + + of_type + zero + """ + + is_Ring = False + """Boolean flag indicating if the domain is a :py:class:`~.Ring`. + + >>> from sympy import ZZ + >>> ZZ.is_Ring + True + + Basically every :py:class:`~.Domain` represents a ring so this flag is + not that useful. + + See also + ======== + + is_PID + is_Field + get_ring + has_assoc_Ring + """ + + is_Field = False + """Boolean flag indicating if the domain is a :py:class:`~.Field`. + + >>> from sympy import ZZ, QQ + >>> ZZ.is_Field + False + >>> QQ.is_Field + True + + See also + ======== + + is_PID + is_Ring + get_field + has_assoc_Field + """ + + has_assoc_Ring = False + """Boolean flag indicating if the domain has an associated + :py:class:`~.Ring`. + + >>> from sympy import QQ + >>> QQ.has_assoc_Ring + True + >>> QQ.get_ring() + ZZ + + See also + ======== + + is_Field + get_ring + """ + + has_assoc_Field = False + """Boolean flag indicating if the domain has an associated + :py:class:`~.Field`. + + >>> from sympy import ZZ + >>> ZZ.has_assoc_Field + True + >>> ZZ.get_field() + QQ + + See also + ======== + + is_Field + get_field + """ + + is_FiniteField = is_FF = False + is_IntegerRing = is_ZZ = False + is_RationalField = is_QQ = False + is_GaussianRing = is_ZZ_I = False + is_GaussianField = is_QQ_I = False + is_RealField = is_RR = False + is_ComplexField = is_CC = False + is_AlgebraicField = is_Algebraic = False + is_PolynomialRing = is_Poly = False + is_FractionField = is_Frac = False + is_SymbolicDomain = is_EX = False + is_SymbolicRawDomain = is_EXRAW = False + is_FiniteExtension = False + + is_Exact = True + is_Numerical = False + + is_Simple = False + is_Composite = False + + is_PID = False + """Boolean flag indicating if the domain is a `principal ideal domain`_. + + >>> from sympy import ZZ + >>> ZZ.has_assoc_Field + True + >>> ZZ.get_field() + QQ + + .. _principal ideal domain: https://en.wikipedia.org/wiki/Principal_ideal_domain + + See also + ======== + + is_Field + get_field + """ + + has_CharacteristicZero = False + + rep: str | None = None + alias: str | None = None + + def __init__(self): + raise NotImplementedError + + def __str__(self): + return self.rep + + def __repr__(self): + return str(self) + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype)) + + def new(self, *args): + return self.dtype(*args) + + @property + def tp(self): + """Alias for :py:attr:`~.Domain.dtype`""" + return self.dtype + + def __call__(self, *args): + """Construct an element of ``self`` domain from ``args``. """ + return self.new(*args) + + def normal(self, *args): + return self.dtype(*args) + + def convert_from(self, element, base): + """Convert ``element`` to ``self.dtype`` given the base domain. """ + if base.alias is not None: + method = "from_" + base.alias + else: + method = "from_" + base.__class__.__name__ + + _convert = getattr(self, method) + + if _convert is not None: + result = _convert(element, base) + + if result is not None: + return result + + raise CoercionFailed("Cannot convert %s of type %s from %s to %s" % (element, type(element), base, self)) + + def convert(self, element, base=None): + """Convert ``element`` to ``self.dtype``. """ + + if base is not None: + if _not_a_coeff(element): + raise CoercionFailed('%s is not in any domain' % element) + return self.convert_from(element, base) + + if self.of_type(element): + return element + + if _not_a_coeff(element): + raise CoercionFailed('%s is not in any domain' % element) + + from sympy.polys.domains import ZZ, QQ, RealField, ComplexField + + if ZZ.of_type(element): + return self.convert_from(element, ZZ) + + if isinstance(element, int): + return self.convert_from(ZZ(element), ZZ) + + if GROUND_TYPES != 'python': + if isinstance(element, ZZ.tp): + return self.convert_from(element, ZZ) + if isinstance(element, QQ.tp): + return self.convert_from(element, QQ) + + if isinstance(element, float): + parent = RealField() + return self.convert_from(parent(element), parent) + + if isinstance(element, complex): + parent = ComplexField() + return self.convert_from(parent(element), parent) + + if type(element).__name__ == 'mpf': + parent = RealField() + return self.convert_from(parent(element), parent) + + if type(element).__name__ == 'mpc': + parent = ComplexField() + return self.convert_from(parent(element), parent) + + if isinstance(element, DomainElement): + return self.convert_from(element, element.parent()) + + # TODO: implement this in from_ methods + if self.is_Numerical and getattr(element, 'is_ground', False): + return self.convert(element.LC()) + + if isinstance(element, Basic): + try: + return self.from_sympy(element) + except (TypeError, ValueError): + pass + else: # TODO: remove this branch + if not is_sequence(element): + try: + element = sympify(element, strict=True) + if isinstance(element, Basic): + return self.from_sympy(element) + except (TypeError, ValueError): + pass + + raise CoercionFailed("Cannot convert %s of type %s to %s" % (element, type(element), self)) + + def of_type(self, element): + """Check if ``a`` is of type ``dtype``. """ + return isinstance(element, self.tp) + + def __contains__(self, a): + """Check if ``a`` belongs to this domain. """ + try: + if _not_a_coeff(a): + raise CoercionFailed + self.convert(a) # this might raise, too + except CoercionFailed: + return False + + return True + + def to_sympy(self, a): + """Convert domain element *a* to a SymPy expression (Expr). + + Explanation + =========== + + Convert a :py:class:`~.Domain` element *a* to :py:class:`~.Expr`. Most + public SymPy functions work with objects of type :py:class:`~.Expr`. + The elements of a :py:class:`~.Domain` have a different internal + representation. It is not possible to mix domain elements with + :py:class:`~.Expr` so each domain has :py:meth:`~.Domain.to_sympy` and + :py:meth:`~.Domain.from_sympy` methods to convert its domain elements + to and from :py:class:`~.Expr`. + + Parameters + ========== + + a: domain element + An element of this :py:class:`~.Domain`. + + Returns + ======= + + expr: Expr + A normal SymPy expression of type :py:class:`~.Expr`. + + Examples + ======== + + Construct an element of the :ref:`QQ` domain and then convert it to + :py:class:`~.Expr`. + + >>> from sympy import QQ, Expr + >>> q_domain = QQ(2) + >>> q_domain + 2 + >>> q_expr = QQ.to_sympy(q_domain) + >>> q_expr + 2 + + Although the printed forms look similar these objects are not of the + same type. + + >>> isinstance(q_domain, Expr) + False + >>> isinstance(q_expr, Expr) + True + + Construct an element of :ref:`K[x]` and convert to + :py:class:`~.Expr`. + + >>> from sympy import Symbol + >>> x = Symbol('x') + >>> K = QQ[x] + >>> x_domain = K.gens[0] # generator x as a domain element + >>> p_domain = x_domain**2/3 + 1 + >>> p_domain + 1/3*x**2 + 1 + >>> p_expr = K.to_sympy(p_domain) + >>> p_expr + x**2/3 + 1 + + The :py:meth:`~.Domain.from_sympy` method is used for the opposite + conversion from a normal SymPy expression to a domain element. + + >>> p_domain == p_expr + False + >>> K.from_sympy(p_expr) == p_domain + True + >>> K.to_sympy(p_domain) == p_expr + True + >>> K.from_sympy(K.to_sympy(p_domain)) == p_domain + True + >>> K.to_sympy(K.from_sympy(p_expr)) == p_expr + True + + The :py:meth:`~.Domain.from_sympy` method makes it easier to construct + domain elements interactively. + + >>> from sympy import Symbol + >>> x = Symbol('x') + >>> K = QQ[x] + >>> K.from_sympy(x**2/3 + 1) + 1/3*x**2 + 1 + + See also + ======== + + from_sympy + convert_from + """ + raise NotImplementedError + + def from_sympy(self, a): + """Convert a SymPy expression to an element of this domain. + + Explanation + =========== + + See :py:meth:`~.Domain.to_sympy` for explanation and examples. + + Parameters + ========== + + expr: Expr + A normal SymPy expression of type :py:class:`~.Expr`. + + Returns + ======= + + a: domain element + An element of this :py:class:`~.Domain`. + + See also + ======== + + to_sympy + convert_from + """ + raise NotImplementedError + + def sum(self, args): + return sum(args, start=self.zero) + + def from_FF(K1, a, K0): + """Convert ``ModularInteger(int)`` to ``dtype``. """ + return None + + def from_FF_python(K1, a, K0): + """Convert ``ModularInteger(int)`` to ``dtype``. """ + return None + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return None + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return None + + def from_FF_gmpy(K1, a, K0): + """Convert ``ModularInteger(mpz)`` to ``dtype``. """ + return None + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return None + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return None + + def from_RealField(K1, a, K0): + """Convert a real element object to ``dtype``. """ + return None + + def from_ComplexField(K1, a, K0): + """Convert a complex element to ``dtype``. """ + return None + + def from_AlgebraicField(K1, a, K0): + """Convert an algebraic number to ``dtype``. """ + return None + + def from_PolynomialRing(K1, a, K0): + """Convert a polynomial to ``dtype``. """ + if a.is_ground: + return K1.convert(a.LC, K0.dom) + + def from_FractionField(K1, a, K0): + """Convert a rational function to ``dtype``. """ + return None + + def from_MonogenicFiniteExtension(K1, a, K0): + """Convert an ``ExtensionElement`` to ``dtype``. """ + return K1.convert_from(a.rep, K0.ring) + + def from_ExpressionDomain(K1, a, K0): + """Convert a ``EX`` object to ``dtype``. """ + return K1.from_sympy(a.ex) + + def from_ExpressionRawDomain(K1, a, K0): + """Convert a ``EX`` object to ``dtype``. """ + return K1.from_sympy(a) + + def from_GlobalPolynomialRing(K1, a, K0): + """Convert a polynomial to ``dtype``. """ + if a.degree() <= 0: + return K1.convert(a.LC(), K0.dom) + + def from_GeneralizedPolynomialRing(K1, a, K0): + return K1.from_FractionField(a, K0) + + def unify_with_symbols(K0, K1, symbols): + if (K0.is_Composite and (set(K0.symbols) & set(symbols))) or (K1.is_Composite and (set(K1.symbols) & set(symbols))): + raise UnificationFailed("Cannot unify %s with %s, given %s generators" % (K0, K1, tuple(symbols))) + + return K0.unify(K1) + + def unify_composite(K0, K1): + """Unify two domains where at least one is composite.""" + K0_ground = K0.dom if K0.is_Composite else K0 + K1_ground = K1.dom if K1.is_Composite else K1 + + K0_symbols = K0.symbols if K0.is_Composite else () + K1_symbols = K1.symbols if K1.is_Composite else () + + domain = K0_ground.unify(K1_ground) + symbols = _unify_gens(K0_symbols, K1_symbols) + order = K0.order if K0.is_Composite else K1.order + + # E.g. ZZ[x].unify(QQ.frac_field(x)) -> ZZ.frac_field(x) + if ((K0.is_FractionField and K1.is_PolynomialRing or + K1.is_FractionField and K0.is_PolynomialRing) and + (not K0_ground.is_Field or not K1_ground.is_Field) and domain.is_Field + and domain.has_assoc_Ring): + domain = domain.get_ring() + + if K0.is_Composite and (not K1.is_Composite or K0.is_FractionField or K1.is_PolynomialRing): + cls = K0.__class__ + else: + cls = K1.__class__ + + # Here cls might be PolynomialRing, FractionField, GlobalPolynomialRing + # (dense/old Polynomialring) or dense/old FractionField. + + from sympy.polys.domains.old_polynomialring import GlobalPolynomialRing + if cls == GlobalPolynomialRing: + return cls(domain, symbols) + + return cls(domain, symbols, order) + + def unify(K0, K1, symbols=None): + """ + Construct a minimal domain that contains elements of ``K0`` and ``K1``. + + Known domains (from smallest to largest): + + - ``GF(p)`` + - ``ZZ`` + - ``QQ`` + - ``RR(prec, tol)`` + - ``CC(prec, tol)`` + - ``ALG(a, b, c)`` + - ``K[x, y, z]`` + - ``K(x, y, z)`` + - ``EX`` + + """ + if symbols is not None: + return K0.unify_with_symbols(K1, symbols) + + if K0 == K1: + return K0 + + if not (K0.has_CharacteristicZero and K1.has_CharacteristicZero): + # Reject unification of domains with different characteristics. + if K0.characteristic() != K1.characteristic(): + raise UnificationFailed("Cannot unify %s with %s" % (K0, K1)) + + # We do not get here if K0 == K1. The two domains have the same + # characteristic but are unequal so at least one is composite and + # we are unifying something like GF(3).unify(GF(3)[x]). + return K0.unify_composite(K1) + + # From here we know both domains have characteristic zero and it can be + # acceptable to fall back on EX. + + if K0.is_EXRAW: + return K0 + if K1.is_EXRAW: + return K1 + + if K0.is_EX: + return K0 + if K1.is_EX: + return K1 + + if K0.is_FiniteExtension or K1.is_FiniteExtension: + if K1.is_FiniteExtension: + K0, K1 = K1, K0 + if K1.is_FiniteExtension: + # Unifying two extensions. + # Try to ensure that K0.unify(K1) == K1.unify(K0) + if list(ordered([K0.modulus, K1.modulus]))[1] == K0.modulus: + K0, K1 = K1, K0 + return K1.set_domain(K0) + else: + # Drop the generator from other and unify with the base domain + K1 = K1.drop(K0.symbol) + K1 = K0.domain.unify(K1) + return K0.set_domain(K1) + + if K0.is_Composite or K1.is_Composite: + return K0.unify_composite(K1) + + if K1.is_ComplexField: + K0, K1 = K1, K0 + if K0.is_ComplexField: + if K1.is_ComplexField or K1.is_RealField: + if K0.precision >= K1.precision: + return K0 + else: + from sympy.polys.domains.complexfield import ComplexField + return ComplexField(prec=K1.precision) + else: + return K0 + + if K1.is_RealField: + K0, K1 = K1, K0 + if K0.is_RealField: + if K1.is_RealField: + if K0.precision >= K1.precision: + return K0 + else: + return K1 + elif K1.is_GaussianRing or K1.is_GaussianField: + from sympy.polys.domains.complexfield import ComplexField + return ComplexField(prec=K0.precision) + else: + return K0 + + if K1.is_AlgebraicField: + K0, K1 = K1, K0 + if K0.is_AlgebraicField: + if K1.is_GaussianRing: + K1 = K1.get_field() + if K1.is_GaussianField: + K1 = K1.as_AlgebraicField() + if K1.is_AlgebraicField: + return K0.__class__(K0.dom.unify(K1.dom), *_unify_gens(K0.orig_ext, K1.orig_ext)) + else: + return K0 + + if K0.is_GaussianField: + return K0 + if K1.is_GaussianField: + return K1 + + if K0.is_GaussianRing: + if K1.is_RationalField: + K0 = K0.get_field() + return K0 + if K1.is_GaussianRing: + if K0.is_RationalField: + K1 = K1.get_field() + return K1 + + if K0.is_RationalField: + return K0 + if K1.is_RationalField: + return K1 + + if K0.is_IntegerRing: + return K0 + if K1.is_IntegerRing: + return K1 + + from sympy.polys.domains import EX + return EX + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + # XXX: Remove this. + return isinstance(other, Domain) and self.dtype == other.dtype + + def __ne__(self, other): + """Returns ``False`` if two domains are equivalent. """ + return not self == other + + def map(self, seq): + """Rersively apply ``self`` to all elements of ``seq``. """ + result = [] + + for elt in seq: + if isinstance(elt, list): + result.append(self.map(elt)) + else: + result.append(self(elt)) + + return result + + def get_ring(self): + """Returns a ring associated with ``self``. """ + raise DomainError('there is no ring associated with %s' % self) + + def get_field(self): + """Returns a field associated with ``self``. """ + raise DomainError('there is no field associated with %s' % self) + + def get_exact(self): + """Returns an exact domain associated with ``self``. """ + return self + + def __getitem__(self, symbols): + """The mathematical way to make a polynomial ring. """ + if hasattr(symbols, '__iter__'): + return self.poly_ring(*symbols) + else: + return self.poly_ring(symbols) + + def poly_ring(self, *symbols, order=lex): + """Returns a polynomial ring, i.e. `K[X]`. """ + from sympy.polys.domains.polynomialring import PolynomialRing + return PolynomialRing(self, symbols, order) + + def frac_field(self, *symbols, order=lex): + """Returns a fraction field, i.e. `K(X)`. """ + from sympy.polys.domains.fractionfield import FractionField + return FractionField(self, symbols, order) + + def old_poly_ring(self, *symbols, **kwargs): + """Returns a polynomial ring, i.e. `K[X]`. """ + from sympy.polys.domains.old_polynomialring import PolynomialRing + return PolynomialRing(self, *symbols, **kwargs) + + def old_frac_field(self, *symbols, **kwargs): + """Returns a fraction field, i.e. `K(X)`. """ + from sympy.polys.domains.old_fractionfield import FractionField + return FractionField(self, *symbols, **kwargs) + + def algebraic_field(self, *extension, alias=None): + r"""Returns an algebraic field, i.e. `K(\alpha, \ldots)`. """ + raise DomainError("Cannot create algebraic field over %s" % self) + + def alg_field_from_poly(self, poly, alias=None, root_index=-1): + r""" + Convenience method to construct an algebraic extension on a root of a + polynomial, chosen by root index. + + Parameters + ========== + + poly : :py:class:`~.Poly` + The polynomial whose root generates the extension. + alias : str, optional (default=None) + Symbol name for the generator of the extension. + E.g. "alpha" or "theta". + root_index : int, optional (default=-1) + Specifies which root of the polynomial is desired. The ordering is + as defined by the :py:class:`~.ComplexRootOf` class. The default of + ``-1`` selects the most natural choice in the common cases of + quadratic and cyclotomic fields (the square root on the positive + real or imaginary axis, resp. $\mathrm{e}^{2\pi i/n}$). + + Examples + ======== + + >>> from sympy import QQ, Poly + >>> from sympy.abc import x + >>> f = Poly(x**2 - 2) + >>> K = QQ.alg_field_from_poly(f) + >>> K.ext.minpoly == f + True + >>> g = Poly(8*x**3 - 6*x - 1) + >>> L = QQ.alg_field_from_poly(g, "alpha") + >>> L.ext.minpoly == g + True + >>> L.to_sympy(L([1, 1, 1])) + alpha**2 + alpha + 1 + + """ + from sympy.polys.rootoftools import CRootOf + root = CRootOf(poly, root_index) + alpha = AlgebraicNumber(root, alias=alias) + return self.algebraic_field(alpha, alias=alias) + + def cyclotomic_field(self, n, ss=False, alias="zeta", gen=None, root_index=-1): + r""" + Convenience method to construct a cyclotomic field. + + Parameters + ========== + + n : int + Construct the nth cyclotomic field. + ss : boolean, optional (default=False) + If True, append *n* as a subscript on the alias string. + alias : str, optional (default="zeta") + Symbol name for the generator. + gen : :py:class:`~.Symbol`, optional (default=None) + Desired variable for the cyclotomic polynomial that defines the + field. If ``None``, a dummy variable will be used. + root_index : int, optional (default=-1) + Specifies which root of the polynomial is desired. The ordering is + as defined by the :py:class:`~.ComplexRootOf` class. The default of + ``-1`` selects the root $\mathrm{e}^{2\pi i/n}$. + + Examples + ======== + + >>> from sympy import QQ, latex + >>> K = QQ.cyclotomic_field(5) + >>> K.to_sympy(K([-1, 1])) + 1 - zeta + >>> L = QQ.cyclotomic_field(7, True) + >>> a = L.to_sympy(L([-1, 1])) + >>> print(a) + 1 - zeta7 + >>> print(latex(a)) + 1 - \zeta_{7} + + """ + from sympy.polys.specialpolys import cyclotomic_poly + if ss: + alias += str(n) + return self.alg_field_from_poly(cyclotomic_poly(n, gen), alias=alias, + root_index=root_index) + + def inject(self, *symbols): + """Inject generators into this domain. """ + raise NotImplementedError + + def drop(self, *symbols): + """Drop generators from this domain. """ + if self.is_Simple: + return self + raise NotImplementedError # pragma: no cover + + def is_zero(self, a): + """Returns True if ``a`` is zero. """ + return not a + + def is_one(self, a): + """Returns True if ``a`` is one. """ + return a == self.one + + def is_positive(self, a): + """Returns True if ``a`` is positive. """ + return a > 0 + + def is_negative(self, a): + """Returns True if ``a`` is negative. """ + return a < 0 + + def is_nonpositive(self, a): + """Returns True if ``a`` is non-positive. """ + return a <= 0 + + def is_nonnegative(self, a): + """Returns True if ``a`` is non-negative. """ + return a >= 0 + + def canonical_unit(self, a): + if self.is_negative(a): + return -self.one + else: + return self.one + + def abs(self, a): + """Absolute value of ``a``, implies ``__abs__``. """ + return abs(a) + + def neg(self, a): + """Returns ``a`` negated, implies ``__neg__``. """ + return -a + + def pos(self, a): + """Returns ``a`` positive, implies ``__pos__``. """ + return +a + + def add(self, a, b): + """Sum of ``a`` and ``b``, implies ``__add__``. """ + return a + b + + def sub(self, a, b): + """Difference of ``a`` and ``b``, implies ``__sub__``. """ + return a - b + + def mul(self, a, b): + """Product of ``a`` and ``b``, implies ``__mul__``. """ + return a * b + + def pow(self, a, b): + """Raise ``a`` to power ``b``, implies ``__pow__``. """ + return a ** b + + def exquo(self, a, b): + """Exact quotient of *a* and *b*. Analogue of ``a / b``. + + Explanation + =========== + + This is essentially the same as ``a / b`` except that an error will be + raised if the division is inexact (if there is any remainder) and the + result will always be a domain element. When working in a + :py:class:`~.Domain` that is not a :py:class:`~.Field` (e.g. :ref:`ZZ` + or :ref:`K[x]`) ``exquo`` should be used instead of ``/``. + + The key invariant is that if ``q = K.exquo(a, b)`` (and ``exquo`` does + not raise an exception) then ``a == b*q``. + + Examples + ======== + + We can use ``K.exquo`` instead of ``/`` for exact division. + + >>> from sympy import ZZ + >>> ZZ.exquo(ZZ(4), ZZ(2)) + 2 + >>> ZZ.exquo(ZZ(5), ZZ(2)) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2 does not divide 5 in ZZ + + Over a :py:class:`~.Field` such as :ref:`QQ`, division (with nonzero + divisor) is always exact so in that case ``/`` can be used instead of + :py:meth:`~.Domain.exquo`. + + >>> from sympy import QQ + >>> QQ.exquo(QQ(5), QQ(2)) + 5/2 + >>> QQ(5) / QQ(2) + 5/2 + + Parameters + ========== + + a: domain element + The dividend + b: domain element + The divisor + + Returns + ======= + + q: domain element + The exact quotient + + Raises + ====== + + ExactQuotientFailed: if exact division is not possible. + ZeroDivisionError: when the divisor is zero. + + See also + ======== + + quo: Analogue of ``a // b`` + rem: Analogue of ``a % b`` + div: Analogue of ``divmod(a, b)`` + + Notes + ===== + + Since the default :py:attr:`~.Domain.dtype` for :ref:`ZZ` is ``int`` + (or ``mpz``) division as ``a / b`` should not be used as it would give + a ``float`` which is not a domain element. + + >>> ZZ(4) / ZZ(2) # doctest: +SKIP + 2.0 + >>> ZZ(5) / ZZ(2) # doctest: +SKIP + 2.5 + + On the other hand with `SYMPY_GROUND_TYPES=flint` elements of :ref:`ZZ` + are ``flint.fmpz`` and division would raise an exception: + + >>> ZZ(4) / ZZ(2) # doctest: +SKIP + Traceback (most recent call last): + ... + TypeError: unsupported operand type(s) for /: 'fmpz' and 'fmpz' + + Using ``/`` with :ref:`ZZ` will lead to incorrect results so + :py:meth:`~.Domain.exquo` should be used instead. + + """ + raise NotImplementedError + + def quo(self, a, b): + """Quotient of *a* and *b*. Analogue of ``a // b``. + + ``K.quo(a, b)`` is equivalent to ``K.div(a, b)[0]``. See + :py:meth:`~.Domain.div` for more explanation. + + See also + ======== + + rem: Analogue of ``a % b`` + div: Analogue of ``divmod(a, b)`` + exquo: Analogue of ``a / b`` + """ + raise NotImplementedError + + def rem(self, a, b): + """Modulo division of *a* and *b*. Analogue of ``a % b``. + + ``K.rem(a, b)`` is equivalent to ``K.div(a, b)[1]``. See + :py:meth:`~.Domain.div` for more explanation. + + See also + ======== + + quo: Analogue of ``a // b`` + div: Analogue of ``divmod(a, b)`` + exquo: Analogue of ``a / b`` + """ + raise NotImplementedError + + def div(self, a, b): + """Quotient and remainder for *a* and *b*. Analogue of ``divmod(a, b)`` + + Explanation + =========== + + This is essentially the same as ``divmod(a, b)`` except that is more + consistent when working over some :py:class:`~.Field` domains such as + :ref:`QQ`. When working over an arbitrary :py:class:`~.Domain` the + :py:meth:`~.Domain.div` method should be used instead of ``divmod``. + + The key invariant is that if ``q, r = K.div(a, b)`` then + ``a == b*q + r``. + + The result of ``K.div(a, b)`` is the same as the tuple + ``(K.quo(a, b), K.rem(a, b))`` except that if both quotient and + remainder are needed then it is more efficient to use + :py:meth:`~.Domain.div`. + + Examples + ======== + + We can use ``K.div`` instead of ``divmod`` for floor division and + remainder. + + >>> from sympy import ZZ, QQ + >>> ZZ.div(ZZ(5), ZZ(2)) + (2, 1) + + If ``K`` is a :py:class:`~.Field` then the division is always exact + with a remainder of :py:attr:`~.Domain.zero`. + + >>> QQ.div(QQ(5), QQ(2)) + (5/2, 0) + + Parameters + ========== + + a: domain element + The dividend + b: domain element + The divisor + + Returns + ======= + + (q, r): tuple of domain elements + The quotient and remainder + + Raises + ====== + + ZeroDivisionError: when the divisor is zero. + + See also + ======== + + quo: Analogue of ``a // b`` + rem: Analogue of ``a % b`` + exquo: Analogue of ``a / b`` + + Notes + ===== + + If ``gmpy`` is installed then the ``gmpy.mpq`` type will be used as + the :py:attr:`~.Domain.dtype` for :ref:`QQ`. The ``gmpy.mpq`` type + defines ``divmod`` in a way that is undesirable so + :py:meth:`~.Domain.div` should be used instead of ``divmod``. + + >>> a = QQ(1) + >>> b = QQ(3, 2) + >>> a # doctest: +SKIP + mpq(1,1) + >>> b # doctest: +SKIP + mpq(3,2) + >>> divmod(a, b) # doctest: +SKIP + (mpz(0), mpq(1,1)) + >>> QQ.div(a, b) # doctest: +SKIP + (mpq(2,3), mpq(0,1)) + + Using ``//`` or ``%`` with :ref:`QQ` will lead to incorrect results so + :py:meth:`~.Domain.div` should be used instead. + + """ + raise NotImplementedError + + def invert(self, a, b): + """Returns inversion of ``a mod b``, implies something. """ + raise NotImplementedError + + def revert(self, a): + """Returns ``a**(-1)`` if possible. """ + raise NotImplementedError + + def numer(self, a): + """Returns numerator of ``a``. """ + raise NotImplementedError + + def denom(self, a): + """Returns denominator of ``a``. """ + raise NotImplementedError + + def half_gcdex(self, a, b): + """Half extended GCD of ``a`` and ``b``. """ + s, t, h = self.gcdex(a, b) + return s, h + + def gcdex(self, a, b): + """Extended GCD of ``a`` and ``b``. """ + raise NotImplementedError + + def cofactors(self, a, b): + """Returns GCD and cofactors of ``a`` and ``b``. """ + gcd = self.gcd(a, b) + cfa = self.quo(a, gcd) + cfb = self.quo(b, gcd) + return gcd, cfa, cfb + + def gcd(self, a, b): + """Returns GCD of ``a`` and ``b``. """ + raise NotImplementedError + + def lcm(self, a, b): + """Returns LCM of ``a`` and ``b``. """ + raise NotImplementedError + + def log(self, a, b): + """Returns b-base logarithm of ``a``. """ + raise NotImplementedError + + def sqrt(self, a): + """Returns a (possibly inexact) square root of ``a``. + + Explanation + =========== + There is no universal definition of "inexact square root" for all + domains. It is not recommended to implement this method for domains + other then :ref:`ZZ`. + + See also + ======== + exsqrt + """ + raise NotImplementedError + + def is_square(self, a): + """Returns whether ``a`` is a square in the domain. + + Explanation + =========== + Returns ``True`` if there is an element ``b`` in the domain such that + ``b * b == a``, otherwise returns ``False``. For inexact domains like + :ref:`RR` and :ref:`CC`, a tiny difference in this equality can be + tolerated. + + See also + ======== + exsqrt + """ + raise NotImplementedError + + def exsqrt(self, a): + """Principal square root of a within the domain if ``a`` is square. + + Explanation + =========== + The implementation of this method should return an element ``b`` in the + domain such that ``b * b == a``, or ``None`` if there is no such ``b``. + For inexact domains like :ref:`RR` and :ref:`CC`, a tiny difference in + this equality can be tolerated. The choice of a "principal" square root + should follow a consistent rule whenever possible. + + See also + ======== + sqrt, is_square + """ + raise NotImplementedError + + def evalf(self, a, prec=None, **options): + """Returns numerical approximation of ``a``. """ + return self.to_sympy(a).evalf(prec, **options) + + n = evalf + + def real(self, a): + return a + + def imag(self, a): + return self.zero + + def almosteq(self, a, b, tolerance=None): + """Check if ``a`` and ``b`` are almost equal. """ + return a == b + + def characteristic(self): + """Return the characteristic of this domain. """ + raise NotImplementedError('characteristic()') + + +__all__ = ['Domain'] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domainelement.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domainelement.py new file mode 100644 index 0000000000000000000000000000000000000000..b1033e86a7edcbffa633efd65ca7ced48f3b1f1a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/domainelement.py @@ -0,0 +1,38 @@ +"""Trait for implementing domain elements. """ + + +from sympy.utilities import public + +@public +class DomainElement: + """ + Represents an element of a domain. + + Mix in this trait into a class whose instances should be recognized as + elements of a domain. Method ``parent()`` gives that domain. + """ + + __slots__ = () + + def parent(self): + """Get the domain associated with ``self`` + + Examples + ======== + + >>> from sympy import ZZ, symbols + >>> x, y = symbols('x, y') + >>> K = ZZ[x,y] + >>> p = K(x)**2 + K(y)**2 + >>> p + x**2 + y**2 + >>> p.parent() + ZZ[x,y] + + Notes + ===== + + This is used by :py:meth:`~.Domain.convert` to identify the domain + associated with a domain element. + """ + raise NotImplementedError("abstract method") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressiondomain.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressiondomain.py new file mode 100644 index 0000000000000000000000000000000000000000..26cd5aa5bf34985f885093be227df6aa9b35d36c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressiondomain.py @@ -0,0 +1,278 @@ +"""Implementation of :class:`ExpressionDomain` class. """ + + +from sympy.core import sympify, SympifyError +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.field import Field +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyutils import PicklableWithSlots +from sympy.utilities import public + +eflags = {"deep": False, "mul": True, "power_exp": False, "power_base": False, + "basic": False, "multinomial": False, "log": False} + +@public +class ExpressionDomain(Field, CharacteristicZero, SimpleDomain): + """A class for arbitrary expressions. """ + + is_SymbolicDomain = is_EX = True + + class Expression(DomainElement, PicklableWithSlots): + """An arbitrary expression. """ + + __slots__ = ('ex',) + + def __init__(self, ex): + if not isinstance(ex, self.__class__): + self.ex = sympify(ex) + else: + self.ex = ex.ex + + def __repr__(f): + return 'EX(%s)' % repr(f.ex) + + def __str__(f): + return 'EX(%s)' % str(f.ex) + + def __hash__(self): + return hash((self.__class__.__name__, self.ex)) + + def parent(self): + return EX + + def as_expr(f): + return f.ex + + def numer(f): + return f.__class__(f.ex.as_numer_denom()[0]) + + def denom(f): + return f.__class__(f.ex.as_numer_denom()[1]) + + def simplify(f, ex): + return f.__class__(ex.cancel().expand(**eflags)) + + def __abs__(f): + return f.__class__(abs(f.ex)) + + def __neg__(f): + return f.__class__(-f.ex) + + def _to_ex(f, g): + try: + return f.__class__(g) + except SympifyError: + return None + + def __lt__(f, g): + return f.ex.sort_key() < g.ex.sort_key() + + def __add__(f, g): + g = f._to_ex(g) + + if g is None: + return NotImplemented + elif g == EX.zero: + return f + elif f == EX.zero: + return g + else: + return f.simplify(f.ex + g.ex) + + def __radd__(f, g): + return f.simplify(f.__class__(g).ex + f.ex) + + def __sub__(f, g): + g = f._to_ex(g) + + if g is None: + return NotImplemented + elif g == EX.zero: + return f + elif f == EX.zero: + return -g + else: + return f.simplify(f.ex - g.ex) + + def __rsub__(f, g): + return f.simplify(f.__class__(g).ex - f.ex) + + def __mul__(f, g): + g = f._to_ex(g) + + if g is None: + return NotImplemented + + if EX.zero in (f, g): + return EX.zero + elif f.ex.is_Number and g.ex.is_Number: + return f.__class__(f.ex*g.ex) + + return f.simplify(f.ex*g.ex) + + def __rmul__(f, g): + return f.simplify(f.__class__(g).ex*f.ex) + + def __pow__(f, n): + n = f._to_ex(n) + + if n is not None: + return f.simplify(f.ex**n.ex) + else: + return NotImplemented + + def __truediv__(f, g): + g = f._to_ex(g) + + if g is not None: + return f.simplify(f.ex/g.ex) + else: + return NotImplemented + + def __rtruediv__(f, g): + return f.simplify(f.__class__(g).ex/f.ex) + + def __eq__(f, g): + return f.ex == f.__class__(g).ex + + def __ne__(f, g): + return not f == g + + def __bool__(f): + return not f.ex.is_zero + + def gcd(f, g): + from sympy.polys import gcd + return f.__class__(gcd(f.ex, f.__class__(g).ex)) + + def lcm(f, g): + from sympy.polys import lcm + return f.__class__(lcm(f.ex, f.__class__(g).ex)) + + dtype = Expression + + zero = Expression(0) + one = Expression(1) + + rep = 'EX' + + has_assoc_Ring = False + has_assoc_Field = True + + def __init__(self): + pass + + def __eq__(self, other): + if isinstance(other, ExpressionDomain): + return True + else: + return NotImplemented + + def __hash__(self): + return hash("EX") + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return a.as_expr() + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + return self.dtype(a) + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_QQ(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a ``GaussianRational`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_GaussianRationalField(K1, a, K0): + """Convert a ``GaussianRational`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_AlgebraicField(K1, a, K0): + """Convert an ``ANP`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_ComplexField(K1, a, K0): + """Convert a mpmath ``mpc`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_PolynomialRing(K1, a, K0): + """Convert a ``DMP`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_FractionField(K1, a, K0): + """Convert a ``DMF`` object to ``dtype``. """ + return K1(K0.to_sympy(a)) + + def from_ExpressionDomain(K1, a, K0): + """Convert a ``EX`` object to ``dtype``. """ + return a + + def get_ring(self): + """Returns a ring associated with ``self``. """ + return self # XXX: EX is not a ring but we don't have much choice here. + + def get_field(self): + """Returns a field associated with ``self``. """ + return self + + def is_positive(self, a): + """Returns True if ``a`` is positive. """ + return a.ex.as_coeff_mul()[0].is_positive + + def is_negative(self, a): + """Returns True if ``a`` is negative. """ + return a.ex.could_extract_minus_sign() + + def is_nonpositive(self, a): + """Returns True if ``a`` is non-positive. """ + return a.ex.as_coeff_mul()[0].is_nonpositive + + def is_nonnegative(self, a): + """Returns True if ``a`` is non-negative. """ + return a.ex.as_coeff_mul()[0].is_nonnegative + + def numer(self, a): + """Returns numerator of ``a``. """ + return a.numer() + + def denom(self, a): + """Returns denominator of ``a``. """ + return a.denom() + + def gcd(self, a, b): + return self(1) + + def lcm(self, a, b): + return a.lcm(b) + + +EX = ExpressionDomain() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressionrawdomain.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressionrawdomain.py new file mode 100644 index 0000000000000000000000000000000000000000..9811ca26c965197a13f56ab8266ad744e4571560 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/expressionrawdomain.py @@ -0,0 +1,57 @@ +"""Implementation of :class:`ExpressionRawDomain` class. """ + + +from sympy.core import Expr, S, sympify, Add +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.field import Field +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + + +@public +class ExpressionRawDomain(Field, CharacteristicZero, SimpleDomain): + """A class for arbitrary expressions but without automatic simplification. """ + + is_SymbolicRawDomain = is_EXRAW = True + + dtype = Expr + + zero = S.Zero + one = S.One + + rep = 'EXRAW' + + has_assoc_Ring = False + has_assoc_Field = True + + def __init__(self): + pass + + @classmethod + def new(self, a): + return sympify(a) + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return a + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + if not isinstance(a, Expr): + raise CoercionFailed(f"Expecting an Expr instance but found: {type(a).__name__}") + return a + + def convert_from(self, a, K): + """Convert a domain element from another domain to EXRAW""" + return K.to_sympy(a) + + def get_field(self): + """Returns a field associated with ``self``. """ + return self + + def sum(self, items): + return Add(*items) + + +EXRAW = ExpressionRawDomain() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/field.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/field.py new file mode 100644 index 0000000000000000000000000000000000000000..a6370294365a38dee1b2eda9942a66aeef8fdae9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/field.py @@ -0,0 +1,118 @@ +"""Implementation of :class:`Field` class. """ + + +from sympy.polys.domains.ring import Ring +from sympy.polys.polyerrors import NotReversible, DomainError +from sympy.utilities import public + +@public +class Field(Ring): + """Represents a field domain. """ + + is_Field = True + is_PID = True + + def get_ring(self): + """Returns a ring associated with ``self``. """ + raise DomainError('there is no ring associated with %s' % self) + + def get_field(self): + """Returns a field associated with ``self``. """ + return self + + def exquo(self, a, b): + """Exact quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return a / b + + def quo(self, a, b): + """Quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return a / b + + def rem(self, a, b): + """Remainder of ``a`` and ``b``, implies nothing. """ + return self.zero + + def div(self, a, b): + """Division of ``a`` and ``b``, implies ``__truediv__``. """ + return a / b, self.zero + + def gcd(self, a, b): + """ + Returns GCD of ``a`` and ``b``. + + This definition of GCD over fields allows to clear denominators + in `primitive()`. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy import S, gcd, primitive + >>> from sympy.abc import x + + >>> QQ.gcd(QQ(2, 3), QQ(4, 9)) + 2/9 + >>> gcd(S(2)/3, S(4)/9) + 2/9 + >>> primitive(2*x/3 + S(4)/9) + (2/9, 3*x + 2) + + """ + try: + ring = self.get_ring() + except DomainError: + return self.one + + p = ring.gcd(self.numer(a), self.numer(b)) + q = ring.lcm(self.denom(a), self.denom(b)) + + return self.convert(p, ring)/q + + def gcdex(self, a, b): + """ + Returns x, y, g such that a * x + b * y == g == gcd(a, b) + """ + d = self.gcd(a, b) + + if a == self.zero: + if b == self.zero: + return self.zero, self.one, self.zero + else: + return self.zero, d/b, d + else: + return d/a, self.zero, d + + def lcm(self, a, b): + """ + Returns LCM of ``a`` and ``b``. + + >>> from sympy.polys.domains import QQ + >>> from sympy import S, lcm + + >>> QQ.lcm(QQ(2, 3), QQ(4, 9)) + 4/3 + >>> lcm(S(2)/3, S(4)/9) + 4/3 + + """ + + try: + ring = self.get_ring() + except DomainError: + return a*b + + p = ring.lcm(self.numer(a), self.numer(b)) + q = ring.gcd(self.denom(a), self.denom(b)) + + return self.convert(p, ring)/q + + def revert(self, a): + """Returns ``a**(-1)`` if possible. """ + if a: + return 1/a + else: + raise NotReversible('zero is not reversible') + + def is_unit(self, a): + """Return true if ``a`` is a invertible""" + return bool(a) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/finitefield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/finitefield.py new file mode 100644 index 0000000000000000000000000000000000000000..d3c48ac07f63aefb9a58c83bb95c5261e67e6a9e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/finitefield.py @@ -0,0 +1,368 @@ +"""Implementation of :class:`FiniteField` class. """ + +import operator + +from sympy.external.gmpy import GROUND_TYPES +from sympy.utilities.decorator import doctest_depends_on + +from sympy.core.numbers import int_valued +from sympy.polys.domains.field import Field + +from sympy.polys.domains.modularinteger import ModularIntegerFactory +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.galoistools import gf_zassenhaus, gf_irred_p_rabin +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public +from sympy.polys.domains.groundtypes import SymPyInteger + + +if GROUND_TYPES == 'flint': + __doctest_skip__ = ['FiniteField'] + + +if GROUND_TYPES == 'flint': + import flint + # Don't use python-flint < 0.5.0 because nmod was missing some features in + # previous versions of python-flint and fmpz_mod was not yet added. + _major, _minor, *_ = flint.__version__.split('.') + if (int(_major), int(_minor)) < (0, 5): + flint = None +else: + flint = None + + +def _modular_int_factory_nmod(mod): + # nmod only recognises int + index = operator.index + mod = index(mod) + nmod = flint.nmod + nmod_poly = flint.nmod_poly + + # flint's nmod is only for moduli up to 2^64-1 (on a 64-bit machine) + try: + nmod(0, mod) + except OverflowError: + return None, None + + def ctx(x): + try: + return nmod(x, mod) + except TypeError: + return nmod(index(x), mod) + + def poly_ctx(cs): + return nmod_poly(cs, mod) + + return ctx, poly_ctx + + +def _modular_int_factory_fmpz_mod(mod): + index = operator.index + fctx = flint.fmpz_mod_ctx(mod) + fctx_poly = flint.fmpz_mod_poly_ctx(mod) + fmpz_mod_poly = flint.fmpz_mod_poly + + def ctx(x): + try: + return fctx(x) + except TypeError: + # x might be Integer + return fctx(index(x)) + + def poly_ctx(cs): + return fmpz_mod_poly(cs, fctx_poly) + + return ctx, poly_ctx + + +def _modular_int_factory(mod, dom, symmetric, self): + # Convert the modulus to ZZ + try: + mod = dom.convert(mod) + except CoercionFailed: + raise ValueError('modulus must be an integer, got %s' % mod) + + ctx, poly_ctx, is_flint = None, None, False + + # Don't use flint if the modulus is not prime as it often crashes. + if flint is not None and mod.is_prime(): + + is_flint = True + + # Try to use flint's nmod first + ctx, poly_ctx = _modular_int_factory_nmod(mod) + + if ctx is None: + # Use fmpz_mod for larger moduli + ctx, poly_ctx = _modular_int_factory_fmpz_mod(mod) + + if ctx is None: + # Use the Python implementation if flint is not available or the + # modulus is not prime. + ctx = ModularIntegerFactory(mod, dom, symmetric, self) + poly_ctx = None # not used + + return ctx, poly_ctx, is_flint + + +@public +@doctest_depends_on(modules=['python', 'gmpy']) +class FiniteField(Field, SimpleDomain): + r"""Finite field of prime order :ref:`GF(p)` + + A :ref:`GF(p)` domain represents a `finite field`_ `\mathbb{F}_p` of prime + order as :py:class:`~.Domain` in the domain system (see + :ref:`polys-domainsintro`). + + A :py:class:`~.Poly` created from an expression with integer + coefficients will have the domain :ref:`ZZ`. However, if the ``modulus=p`` + option is given then the domain will be a finite field instead. + + >>> from sympy import Poly, Symbol + >>> x = Symbol('x') + >>> p = Poly(x**2 + 1) + >>> p + Poly(x**2 + 1, x, domain='ZZ') + >>> p.domain + ZZ + >>> p2 = Poly(x**2 + 1, modulus=2) + >>> p2 + Poly(x**2 + 1, x, modulus=2) + >>> p2.domain + GF(2) + + It is possible to factorise a polynomial over :ref:`GF(p)` using the + modulus argument to :py:func:`~.factor` or by specifying the domain + explicitly. The domain can also be given as a string. + + >>> from sympy import factor, GF + >>> factor(x**2 + 1) + x**2 + 1 + >>> factor(x**2 + 1, modulus=2) + (x + 1)**2 + >>> factor(x**2 + 1, domain=GF(2)) + (x + 1)**2 + >>> factor(x**2 + 1, domain='GF(2)') + (x + 1)**2 + + It is also possible to use :ref:`GF(p)` with the :py:func:`~.cancel` + and :py:func:`~.gcd` functions. + + >>> from sympy import cancel, gcd + >>> cancel((x**2 + 1)/(x + 1)) + (x**2 + 1)/(x + 1) + >>> cancel((x**2 + 1)/(x + 1), domain=GF(2)) + x + 1 + >>> gcd(x**2 + 1, x + 1) + 1 + >>> gcd(x**2 + 1, x + 1, domain=GF(2)) + x + 1 + + When using the domain directly :ref:`GF(p)` can be used as a constructor + to create instances which then support the operations ``+,-,*,**,/`` + + >>> from sympy import GF + >>> K = GF(5) + >>> K + GF(5) + >>> x = K(3) + >>> y = K(2) + >>> x + 3 mod 5 + >>> y + 2 mod 5 + >>> x * y + 1 mod 5 + >>> x / y + 4 mod 5 + + Notes + ===== + + It is also possible to create a :ref:`GF(p)` domain of **non-prime** + order but the resulting ring is **not** a field: it is just the ring of + the integers modulo ``n``. + + >>> K = GF(9) + >>> z = K(3) + >>> z + 3 mod 9 + >>> z**2 + 0 mod 9 + + It would be good to have a proper implementation of prime power fields + (``GF(p**n)``) but these are not yet implemented in SymPY. + + .. _finite field: https://en.wikipedia.org/wiki/Finite_field + """ + + rep = 'FF' + alias = 'FF' + + is_FiniteField = is_FF = True + is_Numerical = True + + has_assoc_Ring = False + has_assoc_Field = True + + dom = None + mod = None + + def __init__(self, mod, symmetric=True): + from sympy.polys.domains import ZZ + dom = ZZ + + if mod <= 0: + raise ValueError('modulus must be a positive integer, got %s' % mod) + + ctx, poly_ctx, is_flint = _modular_int_factory(mod, dom, symmetric, self) + + self.dtype = ctx + self._poly_ctx = poly_ctx + self._is_flint = is_flint + + self.zero = self.dtype(0) + self.one = self.dtype(1) + self.dom = dom + self.mod = mod + self.sym = symmetric + self._tp = type(self.zero) + + @property + def tp(self): + return self._tp + + @property + def is_Field(self): + is_field = getattr(self, '_is_field', None) + if is_field is None: + from sympy.ntheory.primetest import isprime + self._is_field = is_field = isprime(self.mod) + return is_field + + def __str__(self): + return 'GF(%s)' % self.mod + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype, self.mod, self.dom)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + return isinstance(other, FiniteField) and \ + self.mod == other.mod and self.dom == other.dom + + def characteristic(self): + """Return the characteristic of this domain. """ + return self.mod + + def get_field(self): + """Returns a field associated with ``self``. """ + return self + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyInteger(self.to_int(a)) + + def from_sympy(self, a): + """Convert SymPy's Integer to SymPy's ``Integer``. """ + if a.is_Integer: + return self.dtype(self.dom.dtype(int(a))) + elif int_valued(a): + return self.dtype(self.dom.dtype(int(a))) + else: + raise CoercionFailed("expected an integer, got %s" % a) + + def to_int(self, a): + """Convert ``val`` to a Python ``int`` object. """ + aval = int(a) + if self.sym and aval > self.mod // 2: + aval -= self.mod + return aval + + def is_positive(self, a): + """Returns True if ``a`` is positive. """ + return bool(a) + + def is_nonnegative(self, a): + """Returns True if ``a`` is non-negative. """ + return True + + def is_negative(self, a): + """Returns True if ``a`` is negative. """ + return False + + def is_nonpositive(self, a): + """Returns True if ``a`` is non-positive. """ + return not a + + def from_FF(K1, a, K0=None): + """Convert ``ModularInteger(int)`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ(int(a), K0.dom)) + + def from_FF_python(K1, a, K0=None): + """Convert ``ModularInteger(int)`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ_python(int(a), K0.dom)) + + def from_ZZ(K1, a, K0=None): + """Convert Python's ``int`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ_python(a, K0)) + + def from_ZZ_python(K1, a, K0=None): + """Convert Python's ``int`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ_python(a, K0)) + + def from_QQ(K1, a, K0=None): + """Convert Python's ``Fraction`` to ``dtype``. """ + if a.denominator == 1: + return K1.from_ZZ_python(a.numerator) + + def from_QQ_python(K1, a, K0=None): + """Convert Python's ``Fraction`` to ``dtype``. """ + if a.denominator == 1: + return K1.from_ZZ_python(a.numerator) + + def from_FF_gmpy(K1, a, K0=None): + """Convert ``ModularInteger(mpz)`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ_gmpy(a.val, K0.dom)) + + def from_ZZ_gmpy(K1, a, K0=None): + """Convert GMPY's ``mpz`` to ``dtype``. """ + return K1.dtype(K1.dom.from_ZZ_gmpy(a, K0)) + + def from_QQ_gmpy(K1, a, K0=None): + """Convert GMPY's ``mpq`` to ``dtype``. """ + if a.denominator == 1: + return K1.from_ZZ_gmpy(a.numerator) + + def from_RealField(K1, a, K0): + """Convert mpmath's ``mpf`` to ``dtype``. """ + p, q = K0.to_rational(a) + + if q == 1: + return K1.dtype(K1.dom.dtype(p)) + + def is_square(self, a): + """Returns True if ``a`` is a quadratic residue modulo p. """ + # a is not a square <=> x**2-a is irreducible + poly = [int(x) for x in [self.one, self.zero, -a]] + return not gf_irred_p_rabin(poly, self.mod, self.dom) + + def exsqrt(self, a): + """Square root modulo p of ``a`` if it is a quadratic residue. + + Explanation + =========== + Always returns the square root that is no larger than ``p // 2``. + """ + # x**2-a is not square-free if a=0 or the field is characteristic 2 + if self.mod == 2 or a == 0: + return a + # Otherwise, use square-free factorization routine to factorize x**2-a + poly = [int(x) for x in [self.one, self.zero, -a]] + for factor in gf_zassenhaus(poly, self.mod, self.dom): + if len(factor) == 2 and factor[1] <= self.mod // 2: + return self.dtype(factor[1]) + return None + + +FF = GF = FiniteField diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/fractionfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/fractionfield.py new file mode 100644 index 0000000000000000000000000000000000000000..78f5054ddd5480fe6f77442f7a25f22603a4d90d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/fractionfield.py @@ -0,0 +1,181 @@ +"""Implementation of :class:`FractionField` class. """ + + +from sympy.polys.domains.compositedomain import CompositeDomain +from sympy.polys.domains.field import Field +from sympy.polys.polyerrors import CoercionFailed, GeneratorsError +from sympy.utilities import public + +@public +class FractionField(Field, CompositeDomain): + """A class for representing multivariate rational function fields. """ + + is_FractionField = is_Frac = True + + has_assoc_Ring = True + has_assoc_Field = True + + def __init__(self, domain_or_field, symbols=None, order=None): + from sympy.polys.fields import FracField + + if isinstance(domain_or_field, FracField) and symbols is None and order is None: + field = domain_or_field + else: + field = FracField(symbols, domain_or_field, order) + + self.field = field + self.dtype = field.dtype + + self.gens = field.gens + self.ngens = field.ngens + self.symbols = field.symbols + self.domain = field.domain + + # TODO: remove this + self.dom = self.domain + + def new(self, element): + return self.field.field_new(element) + + def of_type(self, element): + """Check if ``a`` is of type ``dtype``. """ + return self.field.is_element(element) + + @property + def zero(self): + return self.field.zero + + @property + def one(self): + return self.field.one + + @property + def order(self): + return self.field.order + + def __str__(self): + return str(self.domain) + '(' + ','.join(map(str, self.symbols)) + ')' + + def __hash__(self): + return hash((self.__class__.__name__, self.field, self.domain, self.symbols)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if not isinstance(other, FractionField): + return NotImplemented + return self.field == other.field + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return a.as_expr() + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + return self.field.from_expr(a) + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_QQ(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + dom = K1.domain + conv = dom.convert_from + if dom.is_ZZ: + return K1(conv(K0.numer(a), K0)) / K1(conv(K0.denom(a), K0)) + else: + return K1(conv(a, K0)) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_GaussianRationalField(K1, a, K0): + """Convert a ``GaussianRational`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a ``GaussianInteger`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_ComplexField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1(K1.domain.convert(a, K0)) + + def from_AlgebraicField(K1, a, K0): + """Convert an algebraic number to ``dtype``. """ + if K1.domain != K0: + a = K1.domain.convert_from(a, K0) + if a is not None: + return K1.new(a) + + def from_PolynomialRing(K1, a, K0): + """Convert a polynomial to ``dtype``. """ + if a.is_ground: + return K1.convert_from(a.coeff(1), K0.domain) + try: + return K1.new(a.set_ring(K1.field.ring)) + except (CoercionFailed, GeneratorsError): + # XXX: We get here if K1=ZZ(x,y) and K0=QQ[x,y] + # and the poly a in K0 has non-integer coefficients. + # It seems that K1.new can handle this but K1.new doesn't work + # when K0.domain is an algebraic field... + try: + return K1.new(a) + except (CoercionFailed, GeneratorsError): + return None + + def from_FractionField(K1, a, K0): + """Convert a rational function to ``dtype``. """ + try: + return a.set_field(K1.field) + except (CoercionFailed, GeneratorsError): + return None + + def get_ring(self): + """Returns a field associated with ``self``. """ + return self.field.to_ring().to_domain() + + def is_positive(self, a): + """Returns True if ``LC(a)`` is positive. """ + return self.domain.is_positive(a.numer.LC) + + def is_negative(self, a): + """Returns True if ``LC(a)`` is negative. """ + return self.domain.is_negative(a.numer.LC) + + def is_nonpositive(self, a): + """Returns True if ``LC(a)`` is non-positive. """ + return self.domain.is_nonpositive(a.numer.LC) + + def is_nonnegative(self, a): + """Returns True if ``LC(a)`` is non-negative. """ + return self.domain.is_nonnegative(a.numer.LC) + + def numer(self, a): + """Returns numerator of ``a``. """ + return a.numer + + def denom(self, a): + """Returns denominator of ``a``. """ + return a.denom + + def factorial(self, a): + """Returns factorial of ``a``. """ + return self.dtype(self.domain.factorial(a)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gaussiandomains.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gaussiandomains.py new file mode 100644 index 0000000000000000000000000000000000000000..a96bed78e29445c90c53605a85faa4df16bf807c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gaussiandomains.py @@ -0,0 +1,706 @@ +"""Domains of Gaussian type.""" + +from __future__ import annotations +from sympy.core.numbers import I +from sympy.polys.polyclasses import DMP +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.domains.integerring import ZZ +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.domains.algebraicfield import AlgebraicField +from sympy.polys.domains.domain import Domain +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.domains.field import Field +from sympy.polys.domains.ring import Ring + + +class GaussianElement(DomainElement): + """Base class for elements of Gaussian type domains.""" + base: Domain + _parent: Domain + + __slots__ = ('x', 'y') + + def __new__(cls, x, y=0): + conv = cls.base.convert + return cls.new(conv(x), conv(y)) + + @classmethod + def new(cls, x, y): + """Create a new GaussianElement of the same domain.""" + obj = super().__new__(cls) + obj.x = x + obj.y = y + return obj + + def parent(self): + """The domain that this is an element of (ZZ_I or QQ_I)""" + return self._parent + + def __hash__(self): + return hash((self.x, self.y)) + + def __eq__(self, other): + if isinstance(other, self.__class__): + return self.x == other.x and self.y == other.y + else: + return NotImplemented + + def __lt__(self, other): + if not isinstance(other, GaussianElement): + return NotImplemented + return [self.y, self.x] < [other.y, other.x] + + def __pos__(self): + return self + + def __neg__(self): + return self.new(-self.x, -self.y) + + def __repr__(self): + return "%s(%s, %s)" % (self._parent.rep, self.x, self.y) + + def __str__(self): + return str(self._parent.to_sympy(self)) + + @classmethod + def _get_xy(cls, other): + if not isinstance(other, cls): + try: + other = cls._parent.convert(other) + except CoercionFailed: + return None, None + return other.x, other.y + + def __add__(self, other): + x, y = self._get_xy(other) + if x is not None: + return self.new(self.x + x, self.y + y) + else: + return NotImplemented + + __radd__ = __add__ + + def __sub__(self, other): + x, y = self._get_xy(other) + if x is not None: + return self.new(self.x - x, self.y - y) + else: + return NotImplemented + + def __rsub__(self, other): + x, y = self._get_xy(other) + if x is not None: + return self.new(x - self.x, y - self.y) + else: + return NotImplemented + + def __mul__(self, other): + x, y = self._get_xy(other) + if x is not None: + return self.new(self.x*x - self.y*y, self.x*y + self.y*x) + else: + return NotImplemented + + __rmul__ = __mul__ + + def __pow__(self, exp): + if exp == 0: + return self.new(1, 0) + if exp < 0: + self, exp = 1/self, -exp + if exp == 1: + return self + pow2 = self + prod = self if exp % 2 else self._parent.one + exp //= 2 + while exp: + pow2 *= pow2 + if exp % 2: + prod *= pow2 + exp //= 2 + return prod + + def __bool__(self): + return bool(self.x) or bool(self.y) + + def quadrant(self): + """Return quadrant index 0-3. + + 0 is included in quadrant 0. + """ + if self.y > 0: + return 0 if self.x > 0 else 1 + elif self.y < 0: + return 2 if self.x < 0 else 3 + else: + return 0 if self.x >= 0 else 2 + + def __rdivmod__(self, other): + try: + other = self._parent.convert(other) + except CoercionFailed: + return NotImplemented + else: + return other.__divmod__(self) + + def __rtruediv__(self, other): + try: + other = QQ_I.convert(other) + except CoercionFailed: + return NotImplemented + else: + return other.__truediv__(self) + + def __floordiv__(self, other): + qr = self.__divmod__(other) + return qr if qr is NotImplemented else qr[0] + + def __rfloordiv__(self, other): + qr = self.__rdivmod__(other) + return qr if qr is NotImplemented else qr[0] + + def __mod__(self, other): + qr = self.__divmod__(other) + return qr if qr is NotImplemented else qr[1] + + def __rmod__(self, other): + qr = self.__rdivmod__(other) + return qr if qr is NotImplemented else qr[1] + + +class GaussianInteger(GaussianElement): + """Gaussian integer: domain element for :ref:`ZZ_I` + + >>> from sympy import ZZ_I + >>> z = ZZ_I(2, 3) + >>> z + (2 + 3*I) + >>> type(z) + + """ + base = ZZ + + def __truediv__(self, other): + """Return a Gaussian rational.""" + return QQ_I.convert(self)/other + + def __divmod__(self, other): + if not other: + raise ZeroDivisionError('divmod({}, 0)'.format(self)) + x, y = self._get_xy(other) + if x is None: + return NotImplemented + + # multiply self and other by x - I*y + # self/other == (a + I*b)/c + a, b = self.x*x + self.y*y, -self.x*y + self.y*x + c = x*x + y*y + + # find integers qx and qy such that + # |a - qx*c| <= c/2 and |b - qy*c| <= c/2 + qx = (2*a + c) // (2*c) # -c <= 2*a - qx*2*c < c + qy = (2*b + c) // (2*c) + + q = GaussianInteger(qx, qy) + # |self/other - q| < 1 since + # |a/c - qx|**2 + |b/c - qy|**2 <= 1/4 + 1/4 < 1 + + return q, self - q*other # |r| < |other| + + +class GaussianRational(GaussianElement): + """Gaussian rational: domain element for :ref:`QQ_I` + + >>> from sympy import QQ_I, QQ + >>> z = QQ_I(QQ(2, 3), QQ(4, 5)) + >>> z + (2/3 + 4/5*I) + >>> type(z) + + """ + base = QQ + + def __truediv__(self, other): + """Return a Gaussian rational.""" + if not other: + raise ZeroDivisionError('{} / 0'.format(self)) + x, y = self._get_xy(other) + if x is None: + return NotImplemented + c = x*x + y*y + + return GaussianRational((self.x*x + self.y*y)/c, + (-self.x*y + self.y*x)/c) + + def __divmod__(self, other): + try: + other = self._parent.convert(other) + except CoercionFailed: + return NotImplemented + if not other: + raise ZeroDivisionError('{} % 0'.format(self)) + else: + return self/other, QQ_I.zero + + +class GaussianDomain(): + """Base class for Gaussian domains.""" + dom: Domain + + is_Numerical = True + is_Exact = True + + has_assoc_Ring = True + has_assoc_Field = True + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + conv = self.dom.to_sympy + return conv(a.x) + I*conv(a.y) + + def from_sympy(self, a): + """Convert a SymPy object to ``self.dtype``.""" + r, b = a.as_coeff_Add() + x = self.dom.from_sympy(r) # may raise CoercionFailed + if not b: + return self.new(x, 0) + r, b = b.as_coeff_Mul() + y = self.dom.from_sympy(r) + if b is I: + return self.new(x, y) + else: + raise CoercionFailed("{} is not Gaussian".format(a)) + + def inject(self, *gens): + """Inject generators into this domain. """ + return self.poly_ring(*gens) + + def canonical_unit(self, d): + unit = self.units[-d.quadrant()] # - for inverse power + return unit + + def is_negative(self, element): + """Returns ``False`` for any ``GaussianElement``. """ + return False + + def is_positive(self, element): + """Returns ``False`` for any ``GaussianElement``. """ + return False + + def is_nonnegative(self, element): + """Returns ``False`` for any ``GaussianElement``. """ + return False + + def is_nonpositive(self, element): + """Returns ``False`` for any ``GaussianElement``. """ + return False + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY mpz to ``self.dtype``.""" + return K1(a) + + def from_ZZ(K1, a, K0): + """Convert a ZZ_python element to ``self.dtype``.""" + return K1(a) + + def from_ZZ_python(K1, a, K0): + """Convert a ZZ_python element to ``self.dtype``.""" + return K1(a) + + def from_QQ(K1, a, K0): + """Convert a GMPY mpq to ``self.dtype``.""" + return K1(a) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY mpq to ``self.dtype``.""" + return K1(a) + + def from_QQ_python(K1, a, K0): + """Convert a QQ_python element to ``self.dtype``.""" + return K1(a) + + def from_AlgebraicField(K1, a, K0): + """Convert an element from ZZ or QQ to ``self.dtype``.""" + if K0.ext.args[0] == I: + return K1.from_sympy(K0.to_sympy(a)) + + +class GaussianIntegerRing(GaussianDomain, Ring): + r"""Ring of Gaussian integers ``ZZ_I`` + + The :ref:`ZZ_I` domain represents the `Gaussian integers`_ `\mathbb{Z}[i]` + as a :py:class:`~.Domain` in the domain system (see + :ref:`polys-domainsintro`). + + By default a :py:class:`~.Poly` created from an expression with + coefficients that are combinations of integers and ``I`` (`\sqrt{-1}`) + will have the domain :ref:`ZZ_I`. + + >>> from sympy import Poly, Symbol, I + >>> x = Symbol('x') + >>> p = Poly(x**2 + I) + >>> p + Poly(x**2 + I, x, domain='ZZ_I') + >>> p.domain + ZZ_I + + The :ref:`ZZ_I` domain can be used to factorise polynomials that are + reducible over the Gaussian integers. + + >>> from sympy import factor + >>> factor(x**2 + 1) + x**2 + 1 + >>> factor(x**2 + 1, domain='ZZ_I') + (x - I)*(x + I) + + The corresponding `field of fractions`_ is the domain of the Gaussian + rationals :ref:`QQ_I`. Conversely :ref:`ZZ_I` is the `ring of integers`_ + of :ref:`QQ_I`. + + >>> from sympy import ZZ_I, QQ_I + >>> ZZ_I.get_field() + QQ_I + >>> QQ_I.get_ring() + ZZ_I + + When using the domain directly :ref:`ZZ_I` can be used as a constructor. + + >>> ZZ_I(3, 4) + (3 + 4*I) + >>> ZZ_I(5) + (5 + 0*I) + + The domain elements of :ref:`ZZ_I` are instances of + :py:class:`~.GaussianInteger` which support the rings operations + ``+,-,*,**``. + + >>> z1 = ZZ_I(5, 1) + >>> z2 = ZZ_I(2, 3) + >>> z1 + (5 + 1*I) + >>> z2 + (2 + 3*I) + >>> z1 + z2 + (7 + 4*I) + >>> z1 * z2 + (7 + 17*I) + >>> z1 ** 2 + (24 + 10*I) + + Both floor (``//``) and modulo (``%``) division work with + :py:class:`~.GaussianInteger` (see the :py:meth:`~.Domain.div` method). + + >>> z3, z4 = ZZ_I(5), ZZ_I(1, 3) + >>> z3 // z4 # floor division + (1 + -1*I) + >>> z3 % z4 # modulo division (remainder) + (1 + -2*I) + >>> (z3//z4)*z4 + z3%z4 == z3 + True + + True division (``/``) in :ref:`ZZ_I` gives an element of :ref:`QQ_I`. The + :py:meth:`~.Domain.exquo` method can be used to divide in :ref:`ZZ_I` when + exact division is possible. + + >>> z1 / z2 + (1 + -1*I) + >>> ZZ_I.exquo(z1, z2) + (1 + -1*I) + >>> z3 / z4 + (1/2 + -3/2*I) + >>> ZZ_I.exquo(z3, z4) + Traceback (most recent call last): + ... + ExactQuotientFailed: (1 + 3*I) does not divide (5 + 0*I) in ZZ_I + + The :py:meth:`~.Domain.gcd` method can be used to compute the `gcd`_ of any + two elements. + + >>> ZZ_I.gcd(ZZ_I(10), ZZ_I(2)) + (2 + 0*I) + >>> ZZ_I.gcd(ZZ_I(5), ZZ_I(2, 1)) + (2 + 1*I) + + .. _Gaussian integers: https://en.wikipedia.org/wiki/Gaussian_integer + .. _gcd: https://en.wikipedia.org/wiki/Greatest_common_divisor + + """ + dom = ZZ + mod = DMP([ZZ.one, ZZ.zero, ZZ.one], ZZ) + dtype = GaussianInteger + zero = dtype(ZZ(0), ZZ(0)) + one = dtype(ZZ(1), ZZ(0)) + imag_unit = dtype(ZZ(0), ZZ(1)) + units = (one, imag_unit, -one, -imag_unit) # powers of i + + rep = 'ZZ_I' + + is_GaussianRing = True + is_ZZ_I = True + is_PID = True + + def __init__(self): # override Domain.__init__ + """For constructing ZZ_I.""" + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if isinstance(other, GaussianIntegerRing): + return True + else: + return NotImplemented + + def __hash__(self): + """Compute hash code of ``self``. """ + return hash('ZZ_I') + + @property + def has_CharacteristicZero(self): + return True + + def characteristic(self): + return 0 + + def get_ring(self): + """Returns a ring associated with ``self``. """ + return self + + def get_field(self): + """Returns a field associated with ``self``. """ + return QQ_I + + def normalize(self, d, *args): + """Return first quadrant element associated with ``d``. + + Also multiply the other arguments by the same power of i. + """ + unit = self.canonical_unit(d) + d *= unit + args = tuple(a*unit for a in args) + return (d,) + args if args else d + + def gcd(self, a, b): + """Greatest common divisor of a and b over ZZ_I.""" + while b: + a, b = b, a % b + return self.normalize(a) + + def gcdex(self, a, b): + """Return x, y, g such that x * a + y * b = g = gcd(a, b)""" + x_a = self.one + x_b = self.zero + y_a = self.zero + y_b = self.one + while b: + q = a // b + a, b = b, a - q * b + x_a, x_b = x_b, x_a - q * x_b + y_a, y_b = y_b, y_a - q * y_b + + a, x_a, y_a = self.normalize(a, x_a, y_a) + return x_a, y_a, a + + def lcm(self, a, b): + """Least common multiple of a and b over ZZ_I.""" + return (a * b) // self.gcd(a, b) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a ZZ_I element to ZZ_I.""" + return a + + def from_GaussianRationalField(K1, a, K0): + """Convert a QQ_I element to ZZ_I.""" + return K1.new(ZZ.convert(a.x), ZZ.convert(a.y)) + +ZZ_I = GaussianInteger._parent = GaussianIntegerRing() + + +class GaussianRationalField(GaussianDomain, Field): + r"""Field of Gaussian rationals ``QQ_I`` + + The :ref:`QQ_I` domain represents the `Gaussian rationals`_ `\mathbb{Q}(i)` + as a :py:class:`~.Domain` in the domain system (see + :ref:`polys-domainsintro`). + + By default a :py:class:`~.Poly` created from an expression with + coefficients that are combinations of rationals and ``I`` (`\sqrt{-1}`) + will have the domain :ref:`QQ_I`. + + >>> from sympy import Poly, Symbol, I + >>> x = Symbol('x') + >>> p = Poly(x**2 + I/2) + >>> p + Poly(x**2 + I/2, x, domain='QQ_I') + >>> p.domain + QQ_I + + The polys option ``gaussian=True`` can be used to specify that the domain + should be :ref:`QQ_I` even if the coefficients do not contain ``I`` or are + all integers. + + >>> Poly(x**2) + Poly(x**2, x, domain='ZZ') + >>> Poly(x**2 + I) + Poly(x**2 + I, x, domain='ZZ_I') + >>> Poly(x**2/2) + Poly(1/2*x**2, x, domain='QQ') + >>> Poly(x**2, gaussian=True) + Poly(x**2, x, domain='QQ_I') + >>> Poly(x**2 + I, gaussian=True) + Poly(x**2 + I, x, domain='QQ_I') + >>> Poly(x**2/2, gaussian=True) + Poly(1/2*x**2, x, domain='QQ_I') + + The :ref:`QQ_I` domain can be used to factorise polynomials that are + reducible over the Gaussian rationals. + + >>> from sympy import factor, QQ_I + >>> factor(x**2/4 + 1) + (x**2 + 4)/4 + >>> factor(x**2/4 + 1, domain='QQ_I') + (x - 2*I)*(x + 2*I)/4 + >>> factor(x**2/4 + 1, domain=QQ_I) + (x - 2*I)*(x + 2*I)/4 + + It is also possible to specify the :ref:`QQ_I` domain explicitly with + polys functions like :py:func:`~.apart`. + + >>> from sympy import apart + >>> apart(1/(1 + x**2)) + 1/(x**2 + 1) + >>> apart(1/(1 + x**2), domain=QQ_I) + I/(2*(x + I)) - I/(2*(x - I)) + + The corresponding `ring of integers`_ is the domain of the Gaussian + integers :ref:`ZZ_I`. Conversely :ref:`QQ_I` is the `field of fractions`_ + of :ref:`ZZ_I`. + + >>> from sympy import ZZ_I, QQ_I, QQ + >>> ZZ_I.get_field() + QQ_I + >>> QQ_I.get_ring() + ZZ_I + + When using the domain directly :ref:`QQ_I` can be used as a constructor. + + >>> QQ_I(3, 4) + (3 + 4*I) + >>> QQ_I(5) + (5 + 0*I) + >>> QQ_I(QQ(2, 3), QQ(4, 5)) + (2/3 + 4/5*I) + + The domain elements of :ref:`QQ_I` are instances of + :py:class:`~.GaussianRational` which support the field operations + ``+,-,*,**,/``. + + >>> z1 = QQ_I(5, 1) + >>> z2 = QQ_I(2, QQ(1, 2)) + >>> z1 + (5 + 1*I) + >>> z2 + (2 + 1/2*I) + >>> z1 + z2 + (7 + 3/2*I) + >>> z1 * z2 + (19/2 + 9/2*I) + >>> z2 ** 2 + (15/4 + 2*I) + + True division (``/``) in :ref:`QQ_I` gives an element of :ref:`QQ_I` and + is always exact. + + >>> z1 / z2 + (42/17 + -2/17*I) + >>> QQ_I.exquo(z1, z2) + (42/17 + -2/17*I) + >>> z1 == (z1/z2)*z2 + True + + Both floor (``//``) and modulo (``%``) division can be used with + :py:class:`~.GaussianRational` (see :py:meth:`~.Domain.div`) + but division is always exact so there is no remainder. + + >>> z1 // z2 + (42/17 + -2/17*I) + >>> z1 % z2 + (0 + 0*I) + >>> QQ_I.div(z1, z2) + ((42/17 + -2/17*I), (0 + 0*I)) + >>> (z1//z2)*z2 + z1%z2 == z1 + True + + .. _Gaussian rationals: https://en.wikipedia.org/wiki/Gaussian_rational + """ + dom = QQ + mod = DMP([QQ.one, QQ.zero, QQ.one], QQ) + dtype = GaussianRational + zero = dtype(QQ(0), QQ(0)) + one = dtype(QQ(1), QQ(0)) + imag_unit = dtype(QQ(0), QQ(1)) + units = (one, imag_unit, -one, -imag_unit) # powers of i + + rep = 'QQ_I' + + is_GaussianField = True + is_QQ_I = True + + def __init__(self): # override Domain.__init__ + """For constructing QQ_I.""" + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if isinstance(other, GaussianRationalField): + return True + else: + return NotImplemented + + def __hash__(self): + """Compute hash code of ``self``. """ + return hash('QQ_I') + + @property + def has_CharacteristicZero(self): + return True + + def characteristic(self): + return 0 + + def get_ring(self): + """Returns a ring associated with ``self``. """ + return ZZ_I + + def get_field(self): + """Returns a field associated with ``self``. """ + return self + + def as_AlgebraicField(self): + """Get equivalent domain as an ``AlgebraicField``. """ + return AlgebraicField(self.dom, I) + + def numer(self, a): + """Get the numerator of ``a``.""" + ZZ_I = self.get_ring() + return ZZ_I.convert(a * self.denom(a)) + + def denom(self, a): + """Get the denominator of ``a``.""" + ZZ = self.dom.get_ring() + QQ = self.dom + ZZ_I = self.get_ring() + denom_ZZ = ZZ.lcm(QQ.denom(a.x), QQ.denom(a.y)) + return ZZ_I(denom_ZZ, ZZ.zero) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a ZZ_I element to QQ_I.""" + return K1.new(a.x, a.y) + + def from_GaussianRationalField(K1, a, K0): + """Convert a QQ_I element to QQ_I.""" + return a + + def from_ComplexField(K1, a, K0): + """Convert a ComplexField element to QQ_I.""" + return K1.new(QQ.convert(a.real), QQ.convert(a.imag)) + + +QQ_I = GaussianRational._parent = GaussianRationalField() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyfinitefield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyfinitefield.py new file mode 100644 index 0000000000000000000000000000000000000000..2e8315a29eca8160102d66b83d953caf998b0fd7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyfinitefield.py @@ -0,0 +1,16 @@ +"""Implementation of :class:`GMPYFiniteField` class. """ + + +from sympy.polys.domains.finitefield import FiniteField +from sympy.polys.domains.gmpyintegerring import GMPYIntegerRing + +from sympy.utilities import public + +@public +class GMPYFiniteField(FiniteField): + """Finite field based on GMPY integers. """ + + alias = 'FF_gmpy' + + def __init__(self, mod, symmetric=True): + super().__init__(mod, GMPYIntegerRing(), symmetric) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyintegerring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyintegerring.py new file mode 100644 index 0000000000000000000000000000000000000000..f132bbe5aff7a4164a09b9b90f00ae5f140cbd03 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyintegerring.py @@ -0,0 +1,105 @@ +"""Implementation of :class:`GMPYIntegerRing` class. """ + + +from sympy.polys.domains.groundtypes import ( + GMPYInteger, SymPyInteger, + factorial as gmpy_factorial, + gmpy_gcdex, gmpy_gcd, gmpy_lcm, sqrt as gmpy_sqrt, +) +from sympy.core.numbers import int_valued +from sympy.polys.domains.integerring import IntegerRing +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +@public +class GMPYIntegerRing(IntegerRing): + """Integer ring based on GMPY's ``mpz`` type. + + This will be the implementation of :ref:`ZZ` if ``gmpy`` or ``gmpy2`` is + installed. Elements will be of type ``gmpy.mpz``. + """ + + dtype = GMPYInteger + zero = dtype(0) + one = dtype(1) + tp = type(one) + alias = 'ZZ_gmpy' + + def __init__(self): + """Allow instantiation of this domain. """ + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyInteger(int(a)) + + def from_sympy(self, a): + """Convert SymPy's Integer to ``dtype``. """ + if a.is_Integer: + return GMPYInteger(a.p) + elif int_valued(a): + return GMPYInteger(int(a)) + else: + raise CoercionFailed("expected an integer, got %s" % a) + + def from_FF_python(K1, a, K0): + """Convert ``ModularInteger(int)`` to GMPY's ``mpz``. """ + return K0.to_int(a) + + def from_ZZ_python(K1, a, K0): + """Convert Python's ``int`` to GMPY's ``mpz``. """ + return GMPYInteger(a) + + def from_QQ(K1, a, K0): + """Convert Python's ``Fraction`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return GMPYInteger(a.numerator) + + def from_QQ_python(K1, a, K0): + """Convert Python's ``Fraction`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return GMPYInteger(a.numerator) + + def from_FF_gmpy(K1, a, K0): + """Convert ``ModularInteger(mpz)`` to GMPY's ``mpz``. """ + return K0.to_int(a) + + def from_ZZ_gmpy(K1, a, K0): + """Convert GMPY's ``mpz`` to GMPY's ``mpz``. """ + return a + + def from_QQ_gmpy(K1, a, K0): + """Convert GMPY ``mpq`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return a.numerator + + def from_RealField(K1, a, K0): + """Convert mpmath's ``mpf`` to GMPY's ``mpz``. """ + p, q = K0.to_rational(a) + + if q == 1: + return GMPYInteger(p) + + def from_GaussianIntegerRing(K1, a, K0): + if a.y == 0: + return a.x + + def gcdex(self, a, b): + """Compute extended GCD of ``a`` and ``b``. """ + h, s, t = gmpy_gcdex(a, b) + return s, t, h + + def gcd(self, a, b): + """Compute GCD of ``a`` and ``b``. """ + return gmpy_gcd(a, b) + + def lcm(self, a, b): + """Compute LCM of ``a`` and ``b``. """ + return gmpy_lcm(a, b) + + def sqrt(self, a): + """Compute square root of ``a``. """ + return gmpy_sqrt(a) + + def factorial(self, a): + """Compute factorial of ``a``. """ + return gmpy_factorial(a) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyrationalfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyrationalfield.py new file mode 100644 index 0000000000000000000000000000000000000000..10bae5b2b7b476f96ba06f637c549ee4afff4c6d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/gmpyrationalfield.py @@ -0,0 +1,100 @@ +"""Implementation of :class:`GMPYRationalField` class. """ + + +from sympy.polys.domains.groundtypes import ( + GMPYRational, SymPyRational, + gmpy_numer, gmpy_denom, factorial as gmpy_factorial, +) +from sympy.polys.domains.rationalfield import RationalField +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +@public +class GMPYRationalField(RationalField): + """Rational field based on GMPY's ``mpq`` type. + + This will be the implementation of :ref:`QQ` if ``gmpy`` or ``gmpy2`` is + installed. Elements will be of type ``gmpy.mpq``. + """ + + dtype = GMPYRational + zero = dtype(0) + one = dtype(1) + tp = type(one) + alias = 'QQ_gmpy' + + def __init__(self): + pass + + def get_ring(self): + """Returns ring associated with ``self``. """ + from sympy.polys.domains import GMPYIntegerRing + return GMPYIntegerRing() + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyRational(int(gmpy_numer(a)), + int(gmpy_denom(a))) + + def from_sympy(self, a): + """Convert SymPy's Integer to ``dtype``. """ + if a.is_Rational: + return GMPYRational(a.p, a.q) + elif a.is_Float: + from sympy.polys.domains import RR + return GMPYRational(*map(int, RR.to_rational(a))) + else: + raise CoercionFailed("expected ``Rational`` object, got %s" % a) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return GMPYRational(a) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return GMPYRational(a.numerator, a.denominator) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return GMPYRational(a) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return a + + def from_GaussianRationalField(K1, a, K0): + """Convert a ``GaussianElement`` object to ``dtype``. """ + if a.y == 0: + return GMPYRational(a.x) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return GMPYRational(*map(int, K0.to_rational(a))) + + def exquo(self, a, b): + """Exact quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return GMPYRational(a) / GMPYRational(b) + + def quo(self, a, b): + """Quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return GMPYRational(a) / GMPYRational(b) + + def rem(self, a, b): + """Remainder of ``a`` and ``b``, implies nothing. """ + return self.zero + + def div(self, a, b): + """Division of ``a`` and ``b``, implies ``__truediv__``. """ + return GMPYRational(a) / GMPYRational(b), self.zero + + def numer(self, a): + """Returns numerator of ``a``. """ + return a.numerator + + def denom(self, a): + """Returns denominator of ``a``. """ + return a.denominator + + def factorial(self, a): + """Returns factorial of ``a``. """ + return GMPYRational(gmpy_factorial(int(a))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/groundtypes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/groundtypes.py new file mode 100644 index 0000000000000000000000000000000000000000..1d50cf912a998767c4a52c5a2f3aab825e072aec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/groundtypes.py @@ -0,0 +1,99 @@ +"""Ground types for various mathematical domains in SymPy. """ + +import builtins +from sympy.external.gmpy import GROUND_TYPES, factorial, sqrt, is_square, sqrtrem + +PythonInteger = builtins.int +PythonReal = builtins.float +PythonComplex = builtins.complex + +from .pythonrational import PythonRational + +from sympy.core.intfunc import ( + igcdex as python_gcdex, + igcd2 as python_gcd, + ilcm as python_lcm, +) + +from sympy.core.numbers import (Float as SymPyReal, Integer as SymPyInteger, Rational as SymPyRational) + + +class _GMPYInteger: + def __init__(self, obj): + pass + +class _GMPYRational: + def __init__(self, obj): + pass + + +if GROUND_TYPES == 'gmpy': + + from gmpy2 import ( + mpz as GMPYInteger, + mpq as GMPYRational, + numer as gmpy_numer, + denom as gmpy_denom, + gcdext as gmpy_gcdex, + gcd as gmpy_gcd, + lcm as gmpy_lcm, + qdiv as gmpy_qdiv, + ) + gcdex = gmpy_gcdex + gcd = gmpy_gcd + lcm = gmpy_lcm + +elif GROUND_TYPES == 'flint': + + from flint import fmpz as _fmpz + + GMPYInteger = _GMPYInteger + GMPYRational = _GMPYRational + gmpy_numer = None + gmpy_denom = None + gmpy_gcdex = None + gmpy_gcd = None + gmpy_lcm = None + gmpy_qdiv = None + + def gcd(a, b): + return a.gcd(b) + + def gcdex(a, b): + x, y, g = python_gcdex(a, b) + return _fmpz(x), _fmpz(y), _fmpz(g) + + def lcm(a, b): + return a.lcm(b) + +else: + GMPYInteger = _GMPYInteger + GMPYRational = _GMPYRational + gmpy_numer = None + gmpy_denom = None + gmpy_gcdex = None + gmpy_gcd = None + gmpy_lcm = None + gmpy_qdiv = None + gcdex = python_gcdex + gcd = python_gcd + lcm = python_lcm + + +__all__ = [ + 'PythonInteger', 'PythonReal', 'PythonComplex', + + 'PythonRational', + + 'python_gcdex', 'python_gcd', 'python_lcm', + + 'SymPyReal', 'SymPyInteger', 'SymPyRational', + + 'GMPYInteger', 'GMPYRational', 'gmpy_numer', + 'gmpy_denom', 'gmpy_gcdex', 'gmpy_gcd', 'gmpy_lcm', + 'gmpy_qdiv', + + 'factorial', 'sqrt', 'is_square', 'sqrtrem', + + 'GMPYInteger', 'GMPYRational', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/integerring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/integerring.py new file mode 100644 index 0000000000000000000000000000000000000000..65eaa9631cfdf138997a4ebdb362c4233fb098fb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/integerring.py @@ -0,0 +1,276 @@ +"""Implementation of :class:`IntegerRing` class. """ + +from sympy.external.gmpy import MPZ, GROUND_TYPES + +from sympy.core.numbers import int_valued +from sympy.polys.domains.groundtypes import ( + SymPyInteger, + factorial, + gcdex, gcd, lcm, sqrt, is_square, sqrtrem, +) + +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.ring import Ring +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +import math + +@public +class IntegerRing(Ring, CharacteristicZero, SimpleDomain): + r"""The domain ``ZZ`` representing the integers `\mathbb{Z}`. + + The :py:class:`IntegerRing` class represents the ring of integers as a + :py:class:`~.Domain` in the domain system. :py:class:`IntegerRing` is a + super class of :py:class:`PythonIntegerRing` and + :py:class:`GMPYIntegerRing` one of which will be the implementation for + :ref:`ZZ` depending on whether or not ``gmpy`` or ``gmpy2`` is installed. + + See also + ======== + + Domain + """ + + rep = 'ZZ' + alias = 'ZZ' + dtype = MPZ + zero = dtype(0) + one = dtype(1) + tp = type(one) + + + is_IntegerRing = is_ZZ = True + is_Numerical = True + is_PID = True + + has_assoc_Ring = True + has_assoc_Field = True + + def __init__(self): + """Allow instantiation of this domain. """ + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if isinstance(other, IntegerRing): + return True + else: + return NotImplemented + + def __hash__(self): + """Compute a hash value for this domain. """ + return hash('ZZ') + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyInteger(int(a)) + + def from_sympy(self, a): + """Convert SymPy's Integer to ``dtype``. """ + if a.is_Integer: + return MPZ(a.p) + elif int_valued(a): + return MPZ(int(a)) + else: + raise CoercionFailed("expected an integer, got %s" % a) + + def get_field(self): + r"""Return the associated field of fractions :ref:`QQ` + + Returns + ======= + + :ref:`QQ`: + The associated field of fractions :ref:`QQ`, a + :py:class:`~.Domain` representing the rational numbers + `\mathbb{Q}`. + + Examples + ======== + + >>> from sympy import ZZ + >>> ZZ.get_field() + QQ + """ + from sympy.polys.domains import QQ + return QQ + + def algebraic_field(self, *extension, alias=None): + r"""Returns an algebraic field, i.e. `\mathbb{Q}(\alpha, \ldots)`. + + Parameters + ========== + + *extension : One or more :py:class:`~.Expr`. + Generators of the extension. These should be expressions that are + algebraic over `\mathbb{Q}`. + + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + If provided, this will be used as the alias symbol for the + primitive element of the returned :py:class:`~.AlgebraicField`. + + Returns + ======= + + :py:class:`~.AlgebraicField` + A :py:class:`~.Domain` representing the algebraic field extension. + + Examples + ======== + + >>> from sympy import ZZ, sqrt + >>> ZZ.algebraic_field(sqrt(2)) + QQ + """ + return self.get_field().algebraic_field(*extension, alias=alias) + + def from_AlgebraicField(K1, a, K0): + """Convert a :py:class:`~.ANP` object to :ref:`ZZ`. + + See :py:meth:`~.Domain.convert`. + """ + if a.is_ground: + return K1.convert(a.LC(), K0.dom) + + def log(self, a, b): + r"""Logarithm of *a* to the base *b*. + + Parameters + ========== + + a: number + b: number + + Returns + ======= + + $\\lfloor\log(a, b)\\rfloor$: + Floor of the logarithm of *a* to the base *b* + + Examples + ======== + + >>> from sympy import ZZ + >>> ZZ.log(ZZ(8), ZZ(2)) + 3 + >>> ZZ.log(ZZ(9), ZZ(2)) + 3 + + Notes + ===== + + This function uses ``math.log`` which is based on ``float`` so it will + fail for large integer arguments. + """ + return self.dtype(int(math.log(int(a), b))) + + def from_FF(K1, a, K0): + """Convert ``ModularInteger(int)`` to GMPY's ``mpz``. """ + return MPZ(K0.to_int(a)) + + def from_FF_python(K1, a, K0): + """Convert ``ModularInteger(int)`` to GMPY's ``mpz``. """ + return MPZ(K0.to_int(a)) + + def from_ZZ(K1, a, K0): + """Convert Python's ``int`` to GMPY's ``mpz``. """ + return MPZ(a) + + def from_ZZ_python(K1, a, K0): + """Convert Python's ``int`` to GMPY's ``mpz``. """ + return MPZ(a) + + def from_QQ(K1, a, K0): + """Convert Python's ``Fraction`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return MPZ(a.numerator) + + def from_QQ_python(K1, a, K0): + """Convert Python's ``Fraction`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return MPZ(a.numerator) + + def from_FF_gmpy(K1, a, K0): + """Convert ``ModularInteger(mpz)`` to GMPY's ``mpz``. """ + return MPZ(K0.to_int(a)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert GMPY's ``mpz`` to GMPY's ``mpz``. """ + return a + + def from_QQ_gmpy(K1, a, K0): + """Convert GMPY ``mpq`` to GMPY's ``mpz``. """ + if a.denominator == 1: + return a.numerator + + def from_RealField(K1, a, K0): + """Convert mpmath's ``mpf`` to GMPY's ``mpz``. """ + p, q = K0.to_rational(a) + + if q == 1: + # XXX: If MPZ is flint.fmpz and p is a gmpy2.mpz, then we need + # to convert via int because fmpz and mpz do not know about each + # other. + return MPZ(int(p)) + + def from_GaussianIntegerRing(K1, a, K0): + if a.y == 0: + return a.x + + def from_EX(K1, a, K0): + """Convert ``Expression`` to GMPY's ``mpz``. """ + if a.is_Integer: + return K1.from_sympy(a) + + def gcdex(self, a, b): + """Compute extended GCD of ``a`` and ``b``. """ + h, s, t = gcdex(a, b) + # XXX: This conditional logic should be handled somewhere else. + if GROUND_TYPES == 'gmpy': + return s, t, h + else: + return h, s, t + + def gcd(self, a, b): + """Compute GCD of ``a`` and ``b``. """ + return gcd(a, b) + + def lcm(self, a, b): + """Compute LCM of ``a`` and ``b``. """ + return lcm(a, b) + + def sqrt(self, a): + """Compute square root of ``a``. """ + return sqrt(a) + + def is_square(self, a): + """Return ``True`` if ``a`` is a square. + + Explanation + =========== + An integer is a square if and only if there exists an integer + ``b`` such that ``b * b == a``. + """ + return is_square(a) + + def exsqrt(self, a): + """Non-negative square root of ``a`` if ``a`` is a square. + + See also + ======== + is_square + """ + if a < 0: + return None + root, rem = sqrtrem(a) + if rem != 0: + return None + return root + + def factorial(self, a): + """Compute factorial of ``a``. """ + return factorial(a) + + +ZZ = IntegerRing() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/modularinteger.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/modularinteger.py new file mode 100644 index 0000000000000000000000000000000000000000..39a0237563c69a77e4736466d1ebcaa7ca39485f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/modularinteger.py @@ -0,0 +1,237 @@ +"""Implementation of :class:`ModularInteger` class. """ + +from __future__ import annotations +from typing import Any + +import operator + +from sympy.polys.polyutils import PicklableWithSlots +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.domains.domainelement import DomainElement + +from sympy.utilities import public +from sympy.utilities.exceptions import sympy_deprecation_warning + +@public +class ModularInteger(PicklableWithSlots, DomainElement): + """A class representing a modular integer. """ + + mod, dom, sym, _parent = None, None, None, None + + __slots__ = ('val',) + + def parent(self): + return self._parent + + def __init__(self, val): + if isinstance(val, self.__class__): + self.val = val.val % self.mod + else: + self.val = self.dom.convert(val) % self.mod + + def modulus(self): + return self.mod + + def __hash__(self): + return hash((self.val, self.mod)) + + def __repr__(self): + return "%s(%s)" % (self.__class__.__name__, self.val) + + def __str__(self): + return "%s mod %s" % (self.val, self.mod) + + def __int__(self): + return int(self.val) + + def to_int(self): + + sympy_deprecation_warning( + """ModularInteger.to_int() is deprecated. + + Use int(a) or K = GF(p) and K.to_int(a) instead of a.to_int(). + """, + deprecated_since_version="1.13", + active_deprecations_target="modularinteger-to-int", + ) + + if self.sym: + if self.val <= self.mod // 2: + return self.val + else: + return self.val - self.mod + else: + return self.val + + def __pos__(self): + return self + + def __neg__(self): + return self.__class__(-self.val) + + @classmethod + def _get_val(cls, other): + if isinstance(other, cls): + return other.val + else: + try: + return cls.dom.convert(other) + except CoercionFailed: + return None + + def __add__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(self.val + val) + else: + return NotImplemented + + def __radd__(self, other): + return self.__add__(other) + + def __sub__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(self.val - val) + else: + return NotImplemented + + def __rsub__(self, other): + return (-self).__add__(other) + + def __mul__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(self.val * val) + else: + return NotImplemented + + def __rmul__(self, other): + return self.__mul__(other) + + def __truediv__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(self.val * self._invert(val)) + else: + return NotImplemented + + def __rtruediv__(self, other): + return self.invert().__mul__(other) + + def __mod__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(self.val % val) + else: + return NotImplemented + + def __rmod__(self, other): + val = self._get_val(other) + + if val is not None: + return self.__class__(val % self.val) + else: + return NotImplemented + + def __pow__(self, exp): + if not exp: + return self.__class__(self.dom.one) + + if exp < 0: + val, exp = self.invert().val, -exp + else: + val = self.val + + return self.__class__(pow(val, int(exp), self.mod)) + + def _compare(self, other, op): + val = self._get_val(other) + + if val is None: + return NotImplemented + + return op(self.val, val % self.mod) + + def _compare_deprecated(self, other, op): + val = self._get_val(other) + + if val is None: + return NotImplemented + + sympy_deprecation_warning( + """Ordered comparisons with modular integers are deprecated. + + Use e.g. int(a) < int(b) instead of a < b. + """, + deprecated_since_version="1.13", + active_deprecations_target="modularinteger-compare", + stacklevel=4, + ) + + return op(self.val, val % self.mod) + + def __eq__(self, other): + return self._compare(other, operator.eq) + + def __ne__(self, other): + return self._compare(other, operator.ne) + + def __lt__(self, other): + return self._compare_deprecated(other, operator.lt) + + def __le__(self, other): + return self._compare_deprecated(other, operator.le) + + def __gt__(self, other): + return self._compare_deprecated(other, operator.gt) + + def __ge__(self, other): + return self._compare_deprecated(other, operator.ge) + + def __bool__(self): + return bool(self.val) + + @classmethod + def _invert(cls, value): + return cls.dom.invert(value, cls.mod) + + def invert(self): + return self.__class__(self._invert(self.val)) + +_modular_integer_cache: dict[tuple[Any, Any, Any], type[ModularInteger]] = {} + +def ModularIntegerFactory(_mod, _dom, _sym, parent): + """Create custom class for specific integer modulus.""" + try: + _mod = _dom.convert(_mod) + except CoercionFailed: + ok = False + else: + ok = True + + if not ok or _mod < 1: + raise ValueError("modulus must be a positive integer, got %s" % _mod) + + key = _mod, _dom, _sym + + try: + cls = _modular_integer_cache[key] + except KeyError: + class cls(ModularInteger): + mod, dom, sym = _mod, _dom, _sym + _parent = parent + + if _sym: + cls.__name__ = "SymmetricModularIntegerMod%s" % _mod + else: + cls.__name__ = "ModularIntegerMod%s" % _mod + + _modular_integer_cache[key] = cls + + return cls diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/mpelements.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/mpelements.py new file mode 100644 index 0000000000000000000000000000000000000000..04ae8eaddcbb7fd8fae684374d9d2c05e79f6c7a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/mpelements.py @@ -0,0 +1,181 @@ +# +# This module is deprecated and should not be used any more. The actual +# implementation of RR and CC now uses mpmath's mpf and mpc types directly. +# +"""Real and complex elements. """ + + +from sympy.external.gmpy import MPQ +from sympy.polys.domains.domainelement import DomainElement +from sympy.utilities import public + +from mpmath.ctx_mp_python import PythonMPContext, _mpf, _mpc, _constant +from mpmath.libmp import (MPZ_ONE, fzero, fone, finf, fninf, fnan, + round_nearest, mpf_mul, repr_dps, int_types, + from_int, from_float, from_str, to_rational) + + +@public +class RealElement(_mpf, DomainElement): + """An element of a real domain. """ + + __slots__ = ('__mpf__',) + + def _set_mpf(self, val): + self.__mpf__ = val + + _mpf_ = property(lambda self: self.__mpf__, _set_mpf) + + def parent(self): + return self.context._parent + +@public +class ComplexElement(_mpc, DomainElement): + """An element of a complex domain. """ + + __slots__ = ('__mpc__',) + + def _set_mpc(self, val): + self.__mpc__ = val + + _mpc_ = property(lambda self: self.__mpc__, _set_mpc) + + def parent(self): + return self.context._parent + +new = object.__new__ + +@public +class MPContext(PythonMPContext): + + def __init__(ctx, prec=53, dps=None, tol=None, real=False): + ctx._prec_rounding = [prec, round_nearest] + + if dps is None: + ctx._set_prec(prec) + else: + ctx._set_dps(dps) + + ctx.mpf = RealElement + ctx.mpc = ComplexElement + ctx.mpf._ctxdata = [ctx.mpf, new, ctx._prec_rounding] + ctx.mpc._ctxdata = [ctx.mpc, new, ctx._prec_rounding] + + if real: + ctx.mpf.context = ctx + else: + ctx.mpc.context = ctx + + ctx.constant = _constant + ctx.constant._ctxdata = [ctx.mpf, new, ctx._prec_rounding] + ctx.constant.context = ctx + + ctx.types = [ctx.mpf, ctx.mpc, ctx.constant] + ctx.trap_complex = True + ctx.pretty = True + + if tol is None: + ctx.tol = ctx._make_tol() + elif tol is False: + ctx.tol = fzero + else: + ctx.tol = ctx._convert_tol(tol) + + ctx.tolerance = ctx.make_mpf(ctx.tol) + + if not ctx.tolerance: + ctx.max_denom = 1000000 + else: + ctx.max_denom = int(1/ctx.tolerance) + + ctx.zero = ctx.make_mpf(fzero) + ctx.one = ctx.make_mpf(fone) + ctx.j = ctx.make_mpc((fzero, fone)) + ctx.inf = ctx.make_mpf(finf) + ctx.ninf = ctx.make_mpf(fninf) + ctx.nan = ctx.make_mpf(fnan) + + def _make_tol(ctx): + hundred = (0, 25, 2, 5) + eps = (0, MPZ_ONE, 1-ctx.prec, 1) + return mpf_mul(hundred, eps) + + def make_tol(ctx): + return ctx.make_mpf(ctx._make_tol()) + + def _convert_tol(ctx, tol): + if isinstance(tol, int_types): + return from_int(tol) + if isinstance(tol, float): + return from_float(tol) + if hasattr(tol, "_mpf_"): + return tol._mpf_ + prec, rounding = ctx._prec_rounding + if isinstance(tol, str): + return from_str(tol, prec, rounding) + raise ValueError("expected a real number, got %s" % tol) + + def _convert_fallback(ctx, x, strings): + raise TypeError("cannot create mpf from " + repr(x)) + + @property + def _repr_digits(ctx): + return repr_dps(ctx._prec) + + @property + def _str_digits(ctx): + return ctx._dps + + def to_rational(ctx, s, limit=True): + p, q = to_rational(s._mpf_) + + # Needed for GROUND_TYPES=flint if gmpy2 is installed because mpmath's + # to_rational() function returns a gmpy2.mpz instance and if MPQ is + # flint.fmpq then MPQ(p, q) will fail. + p = int(p) + + if not limit or q <= ctx.max_denom: + return p, q + + p0, q0, p1, q1 = 0, 1, 1, 0 + n, d = p, q + + while True: + a = n//d + q2 = q0 + a*q1 + if q2 > ctx.max_denom: + break + p0, q0, p1, q1 = p1, q1, p0 + a*p1, q2 + n, d = d, n - a*d + + k = (ctx.max_denom - q0)//q1 + + number = MPQ(p, q) + bound1 = MPQ(p0 + k*p1, q0 + k*q1) + bound2 = MPQ(p1, q1) + + if not bound2 or not bound1: + return p, q + elif abs(bound2 - number) <= abs(bound1 - number): + return bound2.numerator, bound2.denominator + else: + return bound1.numerator, bound1.denominator + + def almosteq(ctx, s, t, rel_eps=None, abs_eps=None): + t = ctx.convert(t) + if abs_eps is None and rel_eps is None: + rel_eps = abs_eps = ctx.tolerance or ctx.make_tol() + if abs_eps is None: + abs_eps = ctx.convert(rel_eps) + elif rel_eps is None: + rel_eps = ctx.convert(abs_eps) + diff = abs(s-t) + if diff <= abs_eps: + return True + abss = abs(s) + abst = abs(t) + if abss < abst: + err = diff/abst + else: + err = diff/abss + return err <= rel_eps diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_fractionfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_fractionfield.py new file mode 100644 index 0000000000000000000000000000000000000000..25d849c39e45259728479ab0305d4956053ae743 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_fractionfield.py @@ -0,0 +1,188 @@ +"""Implementation of :class:`FractionField` class. """ + + +from sympy.polys.domains.field import Field +from sympy.polys.domains.compositedomain import CompositeDomain +from sympy.polys.polyclasses import DMF +from sympy.polys.polyerrors import GeneratorsNeeded +from sympy.polys.polyutils import dict_from_basic, basic_from_dict, _dict_reorder +from sympy.utilities import public + +@public +class FractionField(Field, CompositeDomain): + """A class for representing rational function fields. """ + + dtype = DMF + is_FractionField = is_Frac = True + + has_assoc_Ring = True + has_assoc_Field = True + + def __init__(self, dom, *gens): + if not gens: + raise GeneratorsNeeded("generators not specified") + + lev = len(gens) - 1 + self.ngens = len(gens) + + self.zero = self.dtype.zero(lev, dom) + self.one = self.dtype.one(lev, dom) + + self.domain = self.dom = dom + self.symbols = self.gens = gens + + def set_domain(self, dom): + """Make a new fraction field with given domain. """ + return self.__class__(dom, *self.gens) + + def new(self, element): + return self.dtype(element, self.dom, len(self.gens) - 1) + + def __str__(self): + return str(self.dom) + '(' + ','.join(map(str, self.gens)) + ')' + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype, self.dom, self.gens)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + return isinstance(other, FractionField) and \ + self.dtype == other.dtype and self.dom == other.dom and self.gens == other.gens + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return (basic_from_dict(a.numer().to_sympy_dict(), *self.gens) / + basic_from_dict(a.denom().to_sympy_dict(), *self.gens)) + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + p, q = a.as_numer_denom() + + num, _ = dict_from_basic(p, gens=self.gens) + den, _ = dict_from_basic(q, gens=self.gens) + + for k, v in num.items(): + num[k] = self.dom.from_sympy(v) + + for k, v in den.items(): + den[k] = self.dom.from_sympy(v) + + return self((num, den)).cancel() + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1(K1.dom.convert(a, K0)) + + def from_GlobalPolynomialRing(K1, a, K0): + """Convert a ``DMF`` object to ``dtype``. """ + if K1.gens == K0.gens: + if K1.dom == K0.dom: + return K1(a.to_list()) + else: + return K1(a.convert(K1.dom).to_list()) + else: + monoms, coeffs = _dict_reorder(a.to_dict(), K0.gens, K1.gens) + + if K1.dom != K0.dom: + coeffs = [ K1.dom.convert(c, K0.dom) for c in coeffs ] + + return K1(dict(zip(monoms, coeffs))) + + def from_FractionField(K1, a, K0): + """ + Convert a fraction field element to another fraction field. + + Examples + ======== + + >>> from sympy.polys.polyclasses import DMF + >>> from sympy.polys.domains import ZZ, QQ + >>> from sympy.abc import x + + >>> f = DMF(([ZZ(1), ZZ(2)], [ZZ(1), ZZ(1)]), ZZ) + + >>> QQx = QQ.old_frac_field(x) + >>> ZZx = ZZ.old_frac_field(x) + + >>> QQx.from_FractionField(f, ZZx) + DMF([1, 2], [1, 1], QQ) + + """ + if K1.gens == K0.gens: + if K1.dom == K0.dom: + return a + else: + return K1((a.numer().convert(K1.dom).to_list(), + a.denom().convert(K1.dom).to_list())) + elif set(K0.gens).issubset(K1.gens): + nmonoms, ncoeffs = _dict_reorder( + a.numer().to_dict(), K0.gens, K1.gens) + dmonoms, dcoeffs = _dict_reorder( + a.denom().to_dict(), K0.gens, K1.gens) + + if K1.dom != K0.dom: + ncoeffs = [ K1.dom.convert(c, K0.dom) for c in ncoeffs ] + dcoeffs = [ K1.dom.convert(c, K0.dom) for c in dcoeffs ] + + return K1((dict(zip(nmonoms, ncoeffs)), dict(zip(dmonoms, dcoeffs)))) + + def get_ring(self): + """Returns a ring associated with ``self``. """ + from sympy.polys.domains import PolynomialRing + return PolynomialRing(self.dom, *self.gens) + + def poly_ring(self, *gens): + """Returns a polynomial ring, i.e. `K[X]`. """ + raise NotImplementedError('nested domains not allowed') + + def frac_field(self, *gens): + """Returns a fraction field, i.e. `K(X)`. """ + raise NotImplementedError('nested domains not allowed') + + def is_positive(self, a): + """Returns True if ``a`` is positive. """ + return self.dom.is_positive(a.numer().LC()) + + def is_negative(self, a): + """Returns True if ``a`` is negative. """ + return self.dom.is_negative(a.numer().LC()) + + def is_nonpositive(self, a): + """Returns True if ``a`` is non-positive. """ + return self.dom.is_nonpositive(a.numer().LC()) + + def is_nonnegative(self, a): + """Returns True if ``a`` is non-negative. """ + return self.dom.is_nonnegative(a.numer().LC()) + + def numer(self, a): + """Returns numerator of ``a``. """ + return a.numer() + + def denom(self, a): + """Returns denominator of ``a``. """ + return a.denom() + + def factorial(self, a): + """Returns factorial of ``a``. """ + return self.dtype(self.dom.factorial(a)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_polynomialring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_polynomialring.py new file mode 100644 index 0000000000000000000000000000000000000000..c29a4529aac3c64b29d8c670ac45b6c100294ced --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/old_polynomialring.py @@ -0,0 +1,490 @@ +"""Implementation of :class:`PolynomialRing` class. """ + + +from sympy.polys.agca.modules import FreeModulePolyRing +from sympy.polys.domains.compositedomain import CompositeDomain +from sympy.polys.domains.old_fractionfield import FractionField +from sympy.polys.domains.ring import Ring +from sympy.polys.orderings import monomial_key, build_product_order +from sympy.polys.polyclasses import DMP, DMF +from sympy.polys.polyerrors import (GeneratorsNeeded, PolynomialError, + CoercionFailed, ExactQuotientFailed, NotReversible) +from sympy.polys.polyutils import dict_from_basic, basic_from_dict, _dict_reorder +from sympy.utilities import public +from sympy.utilities.iterables import iterable + + +@public +class PolynomialRingBase(Ring, CompositeDomain): + """ + Base class for generalized polynomial rings. + + This base class should be used for uniform access to generalized polynomial + rings. Subclasses only supply information about the element storage etc. + + Do not instantiate. + """ + + has_assoc_Ring = True + has_assoc_Field = True + + default_order = "grevlex" + + def __init__(self, dom, *gens, **opts): + if not gens: + raise GeneratorsNeeded("generators not specified") + + lev = len(gens) - 1 + self.ngens = len(gens) + + self.zero = self.dtype.zero(lev, dom) + self.one = self.dtype.one(lev, dom) + + self.domain = self.dom = dom + self.symbols = self.gens = gens + # NOTE 'order' may not be set if inject was called through CompositeDomain + self.order = opts.get('order', monomial_key(self.default_order)) + + def set_domain(self, dom): + """Return a new polynomial ring with given domain. """ + return self.__class__(dom, *self.gens, order=self.order) + + def new(self, element): + return self.dtype(element, self.dom, len(self.gens) - 1) + + def _ground_new(self, element): + return self.one.ground_new(element) + + def _from_dict(self, element): + return DMP.from_dict(element, len(self.gens) - 1, self.dom) + + def __str__(self): + s_order = str(self.order) + orderstr = ( + " order=" + s_order) if s_order != self.default_order else "" + return str(self.dom) + '[' + ','.join(map(str, self.gens)) + orderstr + ']' + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype, self.dom, + self.gens, self.order)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + return isinstance(other, PolynomialRingBase) and \ + self.dtype == other.dtype and self.dom == other.dom and \ + self.gens == other.gens and self.order == other.order + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_QQ(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return K1._ground_new(K1.dom.convert(a, K0)) + + def from_AlgebraicField(K1, a, K0): + """Convert a ``ANP`` object to ``dtype``. """ + if K1.dom == K0: + return K1._ground_new(a) + + def from_PolynomialRing(K1, a, K0): + """Convert a ``PolyElement`` object to ``dtype``. """ + if K1.gens == K0.symbols: + if K1.dom == K0.dom: + return K1(dict(a)) # set the correct ring + else: + convert_dom = lambda c: K1.dom.convert_from(c, K0.dom) + return K1._from_dict({m: convert_dom(c) for m, c in a.items()}) + else: + monoms, coeffs = _dict_reorder(a.to_dict(), K0.symbols, K1.gens) + + if K1.dom != K0.dom: + coeffs = [ K1.dom.convert(c, K0.dom) for c in coeffs ] + + return K1._from_dict(dict(zip(monoms, coeffs))) + + def from_GlobalPolynomialRing(K1, a, K0): + """Convert a ``DMP`` object to ``dtype``. """ + if K1.gens == K0.gens: + if K1.dom != K0.dom: + a = a.convert(K1.dom) + return K1(a.to_list()) + else: + monoms, coeffs = _dict_reorder(a.to_dict(), K0.gens, K1.gens) + + if K1.dom != K0.dom: + coeffs = [ K1.dom.convert(c, K0.dom) for c in coeffs ] + + return K1(dict(zip(monoms, coeffs))) + + def get_field(self): + """Returns a field associated with ``self``. """ + return FractionField(self.dom, *self.gens) + + def poly_ring(self, *gens): + """Returns a polynomial ring, i.e. ``K[X]``. """ + raise NotImplementedError('nested domains not allowed') + + def frac_field(self, *gens): + """Returns a fraction field, i.e. ``K(X)``. """ + raise NotImplementedError('nested domains not allowed') + + def revert(self, a): + try: + return self.exquo(self.one, a) + except (ExactQuotientFailed, ZeroDivisionError): + raise NotReversible('%s is not a unit' % a) + + def gcdex(self, a, b): + """Extended GCD of ``a`` and ``b``. """ + return a.gcdex(b) + + def gcd(self, a, b): + """Returns GCD of ``a`` and ``b``. """ + return a.gcd(b) + + def lcm(self, a, b): + """Returns LCM of ``a`` and ``b``. """ + return a.lcm(b) + + def factorial(self, a): + """Returns factorial of ``a``. """ + return self.dtype(self.dom.factorial(a)) + + def _vector_to_sdm(self, v, order): + """ + For internal use by the modules class. + + Convert an iterable of elements of this ring into a sparse distributed + module element. + """ + raise NotImplementedError + + def _sdm_to_dics(self, s, n): + """Helper for _sdm_to_vector.""" + from sympy.polys.distributedmodules import sdm_to_dict + dic = sdm_to_dict(s) + res = [{} for _ in range(n)] + for k, v in dic.items(): + res[k[0]][k[1:]] = v + return res + + def _sdm_to_vector(self, s, n): + """ + For internal use by the modules class. + + Convert a sparse distributed module into a list of length ``n``. + + Examples + ======== + + >>> from sympy import QQ, ilex + >>> from sympy.abc import x, y + >>> R = QQ.old_poly_ring(x, y, order=ilex) + >>> L = [((1, 1, 1), QQ(1)), ((0, 1, 0), QQ(1)), ((0, 0, 1), QQ(2))] + >>> R._sdm_to_vector(L, 2) + [DMF([[1], [2, 0]], [[1]], QQ), DMF([[1, 0], []], [[1]], QQ)] + """ + dics = self._sdm_to_dics(s, n) + # NOTE this works for global and local rings! + return [self(x) for x in dics] + + def free_module(self, rank): + """ + Generate a free module of rank ``rank`` over ``self``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2) + QQ[x]**2 + """ + return FreeModulePolyRing(self, rank) + + +def _vector_to_sdm_helper(v, order): + """Helper method for common code in Global and Local poly rings.""" + from sympy.polys.distributedmodules import sdm_from_dict + d = {} + for i, e in enumerate(v): + for key, value in e.to_dict().items(): + d[(i,) + key] = value + return sdm_from_dict(d, order) + + +@public +class GlobalPolynomialRing(PolynomialRingBase): + """A true polynomial ring, with objects DMP. """ + + is_PolynomialRing = is_Poly = True + dtype = DMP + + def new(self, element): + if isinstance(element, dict): + return DMP.from_dict(element, len(self.gens) - 1, self.dom) + elif element in self.dom: + return self._ground_new(self.dom.convert(element)) + else: + return self.dtype(element, self.dom, len(self.gens) - 1) + + def from_FractionField(K1, a, K0): + """ + Convert a ``DMF`` object to ``DMP``. + + Examples + ======== + + >>> from sympy.polys.polyclasses import DMP, DMF + >>> from sympy.polys.domains import ZZ + >>> from sympy.abc import x + + >>> f = DMF(([ZZ(1), ZZ(1)], [ZZ(1)]), ZZ) + >>> K = ZZ.old_frac_field(x) + + >>> F = ZZ.old_poly_ring(x).from_FractionField(f, K) + + >>> F == DMP([ZZ(1), ZZ(1)], ZZ) + True + >>> type(F) # doctest: +SKIP + + + """ + if a.denom().is_one: + return K1.from_GlobalPolynomialRing(a.numer(), K0) + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return basic_from_dict(a.to_sympy_dict(), *self.gens) + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + try: + rep, _ = dict_from_basic(a, gens=self.gens) + except PolynomialError: + raise CoercionFailed("Cannot convert %s to type %s" % (a, self)) + + for k, v in rep.items(): + rep[k] = self.dom.from_sympy(v) + + return DMP.from_dict(rep, self.ngens - 1, self.dom) + + def is_positive(self, a): + """Returns True if ``LC(a)`` is positive. """ + return self.dom.is_positive(a.LC()) + + def is_negative(self, a): + """Returns True if ``LC(a)`` is negative. """ + return self.dom.is_negative(a.LC()) + + def is_nonpositive(self, a): + """Returns True if ``LC(a)`` is non-positive. """ + return self.dom.is_nonpositive(a.LC()) + + def is_nonnegative(self, a): + """Returns True if ``LC(a)`` is non-negative. """ + return self.dom.is_nonnegative(a.LC()) + + def _vector_to_sdm(self, v, order): + """ + Examples + ======== + + >>> from sympy import lex, QQ + >>> from sympy.abc import x, y + >>> R = QQ.old_poly_ring(x, y) + >>> f = R.convert(x + 2*y) + >>> g = R.convert(x * y) + >>> R._vector_to_sdm([f, g], lex) + [((1, 1, 1), 1), ((0, 1, 0), 1), ((0, 0, 1), 2)] + """ + return _vector_to_sdm_helper(v, order) + + +class GeneralizedPolynomialRing(PolynomialRingBase): + """A generalized polynomial ring, with objects DMF. """ + + dtype = DMF + + def new(self, a): + """Construct an element of ``self`` domain from ``a``. """ + res = self.dtype(a, self.dom, len(self.gens) - 1) + + # make sure res is actually in our ring + if res.denom().terms(order=self.order)[0][0] != (0,)*len(self.gens): + from sympy.printing.str import sstr + raise CoercionFailed("denominator %s not allowed in %s" + % (sstr(res), self)) + return res + + def __contains__(self, a): + try: + a = self.convert(a) + except CoercionFailed: + return False + return a.denom().terms(order=self.order)[0][0] == (0,)*len(self.gens) + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return (basic_from_dict(a.numer().to_sympy_dict(), *self.gens) / + basic_from_dict(a.denom().to_sympy_dict(), *self.gens)) + + def from_sympy(self, a): + """Convert SymPy's expression to ``dtype``. """ + p, q = a.as_numer_denom() + + num, _ = dict_from_basic(p, gens=self.gens) + den, _ = dict_from_basic(q, gens=self.gens) + + for k, v in num.items(): + num[k] = self.dom.from_sympy(v) + + for k, v in den.items(): + den[k] = self.dom.from_sympy(v) + + return self((num, den)).cancel() + + def exquo(self, a, b): + """Exact quotient of ``a`` and ``b``. """ + # Elements are DMF that will always divide (except 0). The result is + # not guaranteed to be in this ring, so we have to check that. + r = a / b + + try: + r = self.new((r.num, r.den)) + except CoercionFailed: + raise ExactQuotientFailed(a, b, self) + + return r + + def from_FractionField(K1, a, K0): + dmf = K1.get_field().from_FractionField(a, K0) + return K1((dmf.num, dmf.den)) + + def _vector_to_sdm(self, v, order): + """ + Turn an iterable into a sparse distributed module. + + Note that the vector is multiplied by a unit first to make all entries + polynomials. + + Examples + ======== + + >>> from sympy import ilex, QQ + >>> from sympy.abc import x, y + >>> R = QQ.old_poly_ring(x, y, order=ilex) + >>> f = R.convert((x + 2*y) / (1 + x)) + >>> g = R.convert(x * y) + >>> R._vector_to_sdm([f, g], ilex) + [((0, 0, 1), 2), ((0, 1, 0), 1), ((1, 1, 1), 1), ((1, + 2, 1), 1)] + """ + # NOTE this is quite inefficient... + u = self.one.numer() + for x in v: + u *= x.denom() + return _vector_to_sdm_helper([x.numer()*u/x.denom() for x in v], order) + + +@public +def PolynomialRing(dom, *gens, **opts): + r""" + Create a generalized multivariate polynomial ring. + + A generalized polynomial ring is defined by a ground field `K`, a set + of generators (typically `x_1, \ldots, x_n`) and a monomial order `<`. + The monomial order can be global, local or mixed. In any case it induces + a total ordering on the monomials, and there exists for every (non-zero) + polynomial `f \in K[x_1, \ldots, x_n]` a well-defined "leading monomial" + `LM(f) = LM(f, >)`. One can then define a multiplicative subset + `S = S_> = \{f \in K[x_1, \ldots, x_n] | LM(f) = 1\}`. The generalized + polynomial ring corresponding to the monomial order is + `R = S^{-1}K[x_1, \ldots, x_n]`. + + If `>` is a so-called global order, that is `1` is the smallest monomial, + then we just have `S = K` and `R = K[x_1, \ldots, x_n]`. + + Examples + ======== + + A few examples may make this clearer. + + >>> from sympy.abc import x, y + >>> from sympy import QQ + + Our first ring uses global lexicographic order. + + >>> R1 = QQ.old_poly_ring(x, y, order=(("lex", x, y),)) + + The second ring uses local lexicographic order. Note that when using a + single (non-product) order, you can just specify the name and omit the + variables: + + >>> R2 = QQ.old_poly_ring(x, y, order="ilex") + + The third and fourth rings use a mixed orders: + + >>> o1 = (("ilex", x), ("lex", y)) + >>> o2 = (("lex", x), ("ilex", y)) + >>> R3 = QQ.old_poly_ring(x, y, order=o1) + >>> R4 = QQ.old_poly_ring(x, y, order=o2) + + We will investigate what elements of `K(x, y)` are contained in the various + rings. + + >>> L = [x, 1/x, y/(1 + x), 1/(1 + y), 1/(1 + x*y)] + >>> test = lambda R: [f in R for f in L] + + The first ring is just `K[x, y]`: + + >>> test(R1) + [True, False, False, False, False] + + The second ring is R1 localised at the maximal ideal (x, y): + + >>> test(R2) + [True, False, True, True, True] + + The third ring is R1 localised at the prime ideal (x): + + >>> test(R3) + [True, False, True, False, True] + + Finally the fourth ring is R1 localised at `S = K[x, y] \setminus yK[y]`: + + >>> test(R4) + [True, False, False, True, False] + """ + + order = opts.get("order", GeneralizedPolynomialRing.default_order) + if iterable(order): + order = build_product_order(order, gens) + order = monomial_key(order) + opts['order'] = order + + if order.is_global: + return GlobalPolynomialRing(dom, *gens, **opts) + else: + return GeneralizedPolynomialRing(dom, *gens, **opts) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/polynomialring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/polynomialring.py new file mode 100644 index 0000000000000000000000000000000000000000..daccdcdede4d409e995a79540b0c3f9e8017d2d9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/polynomialring.py @@ -0,0 +1,203 @@ +"""Implementation of :class:`PolynomialRing` class. """ + + +from sympy.polys.domains.ring import Ring +from sympy.polys.domains.compositedomain import CompositeDomain + +from sympy.polys.polyerrors import CoercionFailed, GeneratorsError +from sympy.utilities import public + +@public +class PolynomialRing(Ring, CompositeDomain): + """A class for representing multivariate polynomial rings. """ + + is_PolynomialRing = is_Poly = True + + has_assoc_Ring = True + has_assoc_Field = True + + def __init__(self, domain_or_ring, symbols=None, order=None): + from sympy.polys.rings import PolyRing + + if isinstance(domain_or_ring, PolyRing) and symbols is None and order is None: + ring = domain_or_ring + else: + ring = PolyRing(symbols, domain_or_ring, order) + + self.ring = ring + self.dtype = ring.dtype + + self.gens = ring.gens + self.ngens = ring.ngens + self.symbols = ring.symbols + self.domain = ring.domain + + + if symbols: + if ring.domain.is_Field and ring.domain.is_Exact and len(symbols)==1: + self.is_PID = True + + # TODO: remove this + self.dom = self.domain + + def new(self, element): + return self.ring.ring_new(element) + + def of_type(self, element): + """Check if ``a`` is of type ``dtype``. """ + return self.ring.is_element(element) + + @property + def zero(self): + return self.ring.zero + + @property + def one(self): + return self.ring.one + + @property + def order(self): + return self.ring.order + + def __str__(self): + return str(self.domain) + '[' + ','.join(map(str, self.symbols)) + ']' + + def __hash__(self): + return hash((self.__class__.__name__, self.ring, self.domain, self.symbols)) + + def __eq__(self, other): + """Returns `True` if two domains are equivalent. """ + if not isinstance(other, PolynomialRing): + return NotImplemented + return self.ring == other.ring + + def is_unit(self, a): + """Returns ``True`` if ``a`` is a unit of ``self``""" + if not a.is_ground: + return False + K = self.domain + return K.is_unit(K.convert_from(a, self)) + + def canonical_unit(self, a): + u = self.domain.canonical_unit(a.LC) + return self.ring.ground_new(u) + + def to_sympy(self, a): + """Convert `a` to a SymPy object. """ + return a.as_expr() + + def from_sympy(self, a): + """Convert SymPy's expression to `dtype`. """ + return self.ring.from_expr(a) + + def from_ZZ(K1, a, K0): + """Convert a Python `int` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_ZZ_python(K1, a, K0): + """Convert a Python `int` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_QQ(K1, a, K0): + """Convert a Python `Fraction` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_QQ_python(K1, a, K0): + """Convert a Python `Fraction` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY `mpz` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY `mpq` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_GaussianIntegerRing(K1, a, K0): + """Convert a `GaussianInteger` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_GaussianRationalField(K1, a, K0): + """Convert a `GaussianRational` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_RealField(K1, a, K0): + """Convert a mpmath `mpf` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_ComplexField(K1, a, K0): + """Convert a mpmath `mpf` object to `dtype`. """ + return K1(K1.domain.convert(a, K0)) + + def from_AlgebraicField(K1, a, K0): + """Convert an algebraic number to ``dtype``. """ + if K1.domain != K0: + a = K1.domain.convert_from(a, K0) + if a is not None: + return K1.new(a) + + def from_PolynomialRing(K1, a, K0): + """Convert a polynomial to ``dtype``. """ + try: + return a.set_ring(K1.ring) + except (CoercionFailed, GeneratorsError): + return None + + def from_FractionField(K1, a, K0): + """Convert a rational function to ``dtype``. """ + if K1.domain == K0: + return K1.ring.from_list([a]) + + q, r = K0.numer(a).div(K0.denom(a)) + + if r.is_zero: + return K1.from_PolynomialRing(q, K0.field.ring.to_domain()) + else: + return None + + def from_GlobalPolynomialRing(K1, a, K0): + """Convert from old poly ring to ``dtype``. """ + if K1.symbols == K0.gens: + ad = a.to_dict() + if K1.domain != K0.domain: + ad = {m: K1.domain.convert(c) for m, c in ad.items()} + return K1(ad) + elif a.is_ground and K0.domain == K1: + return K1.convert_from(a.to_list()[0], K0.domain) + + def get_field(self): + """Returns a field associated with `self`. """ + return self.ring.to_field().to_domain() + + def is_positive(self, a): + """Returns True if `LC(a)` is positive. """ + return self.domain.is_positive(a.LC) + + def is_negative(self, a): + """Returns True if `LC(a)` is negative. """ + return self.domain.is_negative(a.LC) + + def is_nonpositive(self, a): + """Returns True if `LC(a)` is non-positive. """ + return self.domain.is_nonpositive(a.LC) + + def is_nonnegative(self, a): + """Returns True if `LC(a)` is non-negative. """ + return self.domain.is_nonnegative(a.LC) + + def gcdex(self, a, b): + """Extended GCD of `a` and `b`. """ + return a.gcdex(b) + + def gcd(self, a, b): + """Returns GCD of `a` and `b`. """ + return a.gcd(b) + + def lcm(self, a, b): + """Returns LCM of `a` and `b`. """ + return a.lcm(b) + + def factorial(self, a): + """Returns factorial of `a`. """ + return self.dtype(self.domain.factorial(a)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonfinitefield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonfinitefield.py new file mode 100644 index 0000000000000000000000000000000000000000..44baa4f6d1b43317283041206eaa43e06a5cc8db --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonfinitefield.py @@ -0,0 +1,16 @@ +"""Implementation of :class:`PythonFiniteField` class. """ + + +from sympy.polys.domains.finitefield import FiniteField +from sympy.polys.domains.pythonintegerring import PythonIntegerRing + +from sympy.utilities import public + +@public +class PythonFiniteField(FiniteField): + """Finite field based on Python's integers. """ + + alias = 'FF_python' + + def __init__(self, mod, symmetric=True): + super().__init__(mod, PythonIntegerRing(), symmetric) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonintegerring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonintegerring.py new file mode 100644 index 0000000000000000000000000000000000000000..81ee9637a4ebcfaf3c5f11d12c18265305984c25 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonintegerring.py @@ -0,0 +1,98 @@ +"""Implementation of :class:`PythonIntegerRing` class. """ + + +from sympy.core.numbers import int_valued +from sympy.polys.domains.groundtypes import ( + PythonInteger, SymPyInteger, sqrt as python_sqrt, + factorial as python_factorial, python_gcdex, python_gcd, python_lcm, +) +from sympy.polys.domains.integerring import IntegerRing +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +@public +class PythonIntegerRing(IntegerRing): + """Integer ring based on Python's ``int`` type. + + This will be used as :ref:`ZZ` if ``gmpy`` and ``gmpy2`` are not + installed. Elements are instances of the standard Python ``int`` type. + """ + + dtype = PythonInteger + zero = dtype(0) + one = dtype(1) + alias = 'ZZ_python' + + def __init__(self): + """Allow instantiation of this domain. """ + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyInteger(a) + + def from_sympy(self, a): + """Convert SymPy's Integer to ``dtype``. """ + if a.is_Integer: + return PythonInteger(a.p) + elif int_valued(a): + return PythonInteger(int(a)) + else: + raise CoercionFailed("expected an integer, got %s" % a) + + def from_FF_python(K1, a, K0): + """Convert ``ModularInteger(int)`` to Python's ``int``. """ + return K0.to_int(a) + + def from_ZZ_python(K1, a, K0): + """Convert Python's ``int`` to Python's ``int``. """ + return a + + def from_QQ(K1, a, K0): + """Convert Python's ``Fraction`` to Python's ``int``. """ + if a.denominator == 1: + return a.numerator + + def from_QQ_python(K1, a, K0): + """Convert Python's ``Fraction`` to Python's ``int``. """ + if a.denominator == 1: + return a.numerator + + def from_FF_gmpy(K1, a, K0): + """Convert ``ModularInteger(mpz)`` to Python's ``int``. """ + return PythonInteger(K0.to_int(a)) + + def from_ZZ_gmpy(K1, a, K0): + """Convert GMPY's ``mpz`` to Python's ``int``. """ + return PythonInteger(a) + + def from_QQ_gmpy(K1, a, K0): + """Convert GMPY's ``mpq`` to Python's ``int``. """ + if a.denom() == 1: + return PythonInteger(a.numer()) + + def from_RealField(K1, a, K0): + """Convert mpmath's ``mpf`` to Python's ``int``. """ + p, q = K0.to_rational(a) + + if q == 1: + return PythonInteger(p) + + def gcdex(self, a, b): + """Compute extended GCD of ``a`` and ``b``. """ + return python_gcdex(a, b) + + def gcd(self, a, b): + """Compute GCD of ``a`` and ``b``. """ + return python_gcd(a, b) + + def lcm(self, a, b): + """Compute LCM of ``a`` and ``b``. """ + return python_lcm(a, b) + + def sqrt(self, a): + """Compute square root of ``a``. """ + return python_sqrt(a) + + def factorial(self, a): + """Compute factorial of ``a``. """ + return python_factorial(a) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrational.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrational.py new file mode 100644 index 0000000000000000000000000000000000000000..87b56d6c929c3ce3ce153dce7b3c210821d706a0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrational.py @@ -0,0 +1,22 @@ +""" +Rational number type based on Python integers. + +The PythonRational class from here has been moved to +sympy.external.pythonmpq + +This module is just left here for backwards compatibility. +""" + + +from sympy.core.numbers import Rational +from sympy.core.sympify import _sympy_converter +from sympy.utilities import public +from sympy.external.pythonmpq import PythonMPQ + + +PythonRational = public(PythonMPQ) + + +def sympify_pythonrational(arg): + return Rational(arg.numerator, arg.denominator) +_sympy_converter[PythonRational] = sympify_pythonrational diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrationalfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrationalfield.py new file mode 100644 index 0000000000000000000000000000000000000000..51afaef636f000855d51a69fb93eb416ae1e5347 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/pythonrationalfield.py @@ -0,0 +1,73 @@ +"""Implementation of :class:`PythonRationalField` class. """ + + +from sympy.polys.domains.groundtypes import PythonInteger, PythonRational, SymPyRational +from sympy.polys.domains.rationalfield import RationalField +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +@public +class PythonRationalField(RationalField): + """Rational field based on :ref:`MPQ`. + + This will be used as :ref:`QQ` if ``gmpy`` and ``gmpy2`` are not + installed. Elements are instances of :ref:`MPQ`. + """ + + dtype = PythonRational + zero = dtype(0) + one = dtype(1) + alias = 'QQ_python' + + def __init__(self): + pass + + def get_ring(self): + """Returns ring associated with ``self``. """ + from sympy.polys.domains import PythonIntegerRing + return PythonIntegerRing() + + def to_sympy(self, a): + """Convert `a` to a SymPy object. """ + return SymPyRational(a.numerator, a.denominator) + + def from_sympy(self, a): + """Convert SymPy's Rational to `dtype`. """ + if a.is_Rational: + return PythonRational(a.p, a.q) + elif a.is_Float: + from sympy.polys.domains import RR + p, q = RR.to_rational(a) + return PythonRational(int(p), int(q)) + else: + raise CoercionFailed("expected `Rational` object, got %s" % a) + + def from_ZZ_python(K1, a, K0): + """Convert a Python `int` object to `dtype`. """ + return PythonRational(a) + + def from_QQ_python(K1, a, K0): + """Convert a Python `Fraction` object to `dtype`. """ + return a + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY `mpz` object to `dtype`. """ + return PythonRational(PythonInteger(a)) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY `mpq` object to `dtype`. """ + return PythonRational(PythonInteger(a.numer()), + PythonInteger(a.denom())) + + def from_RealField(K1, a, K0): + """Convert a mpmath `mpf` object to `dtype`. """ + p, q = K0.to_rational(a) + return PythonRational(int(p), int(q)) + + def numer(self, a): + """Returns numerator of `a`. """ + return a.numerator + + def denom(self, a): + """Returns denominator of `a`. """ + return a.denominator diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/quotientring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/quotientring.py new file mode 100644 index 0000000000000000000000000000000000000000..7e8abf6b210a5627c9c139e41248637c9b88931f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/quotientring.py @@ -0,0 +1,202 @@ +"""Implementation of :class:`QuotientRing` class.""" + + +from sympy.polys.agca.modules import FreeModuleQuotientRing +from sympy.polys.domains.ring import Ring +from sympy.polys.polyerrors import NotReversible, CoercionFailed +from sympy.utilities import public + +# TODO +# - successive quotients (when quotient ideals are implemented) +# - poly rings over quotients? +# - division by non-units in integral domains? + +@public +class QuotientRingElement: + """ + Class representing elements of (commutative) quotient rings. + + Attributes: + + - ring - containing ring + - data - element of ring.ring (i.e. base ring) representing self + """ + + def __init__(self, ring, data): + self.ring = ring + self.data = data + + def __str__(self): + from sympy.printing.str import sstr + data = self.ring.ring.to_sympy(self.data) + return sstr(data) + " + " + str(self.ring.base_ideal) + + __repr__ = __str__ + + def __bool__(self): + return not self.ring.is_zero(self) + + def __add__(self, om): + if not isinstance(om, self.__class__) or om.ring != self.ring: + try: + om = self.ring.convert(om) + except (NotImplementedError, CoercionFailed): + return NotImplemented + return self.ring(self.data + om.data) + + __radd__ = __add__ + + def __neg__(self): + return self.ring(self.data*self.ring.ring.convert(-1)) + + def __sub__(self, om): + return self.__add__(-om) + + def __rsub__(self, om): + return (-self).__add__(om) + + def __mul__(self, o): + if not isinstance(o, self.__class__): + try: + o = self.ring.convert(o) + except (NotImplementedError, CoercionFailed): + return NotImplemented + return self.ring(self.data*o.data) + + __rmul__ = __mul__ + + def __rtruediv__(self, o): + return self.ring.revert(self)*o + + def __truediv__(self, o): + if not isinstance(o, self.__class__): + try: + o = self.ring.convert(o) + except (NotImplementedError, CoercionFailed): + return NotImplemented + return self.ring.revert(o)*self + + def __pow__(self, oth): + if oth < 0: + return self.ring.revert(self) ** -oth + return self.ring(self.data ** oth) + + def __eq__(self, om): + if not isinstance(om, self.__class__) or om.ring != self.ring: + return False + return self.ring.is_zero(self - om) + + def __ne__(self, om): + return not self == om + + +class QuotientRing(Ring): + """ + Class representing (commutative) quotient rings. + + You should not usually instantiate this by hand, instead use the constructor + from the base ring in the construction. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> I = QQ.old_poly_ring(x).ideal(x**3 + 1) + >>> QQ.old_poly_ring(x).quotient_ring(I) + QQ[x]/ + + Shorter versions are possible: + + >>> QQ.old_poly_ring(x)/I + QQ[x]/ + + >>> QQ.old_poly_ring(x)/[x**3 + 1] + QQ[x]/ + + Attributes: + + - ring - the base ring + - base_ideal - the ideal used to form the quotient + """ + + has_assoc_Ring = True + has_assoc_Field = False + dtype = QuotientRingElement + + def __init__(self, ring, ideal): + if not ideal.ring == ring: + raise ValueError('Ideal must belong to %s, got %s' % (ring, ideal)) + self.ring = ring + self.base_ideal = ideal + self.zero = self(self.ring.zero) + self.one = self(self.ring.one) + + def __str__(self): + return str(self.ring) + "/" + str(self.base_ideal) + + def __hash__(self): + return hash((self.__class__.__name__, self.dtype, self.ring, self.base_ideal)) + + def new(self, a): + """Construct an element of ``self`` domain from ``a``. """ + if not isinstance(a, self.ring.dtype): + a = self.ring(a) + # TODO optionally disable reduction? + return self.dtype(self, self.base_ideal.reduce_element(a)) + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + return isinstance(other, QuotientRing) and \ + self.ring == other.ring and self.base_ideal == other.base_ideal + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return K1(K1.ring.convert(a, K0)) + + from_ZZ_python = from_ZZ + from_QQ_python = from_ZZ_python + from_ZZ_gmpy = from_ZZ_python + from_QQ_gmpy = from_ZZ_python + from_RealField = from_ZZ_python + from_GlobalPolynomialRing = from_ZZ_python + from_FractionField = from_ZZ_python + + def from_sympy(self, a): + return self(self.ring.from_sympy(a)) + + def to_sympy(self, a): + return self.ring.to_sympy(a.data) + + def from_QuotientRing(self, a, K0): + if K0 == self: + return a + + def poly_ring(self, *gens): + """Returns a polynomial ring, i.e. ``K[X]``. """ + raise NotImplementedError('nested domains not allowed') + + def frac_field(self, *gens): + """Returns a fraction field, i.e. ``K(X)``. """ + raise NotImplementedError('nested domains not allowed') + + def revert(self, a): + """ + Compute a**(-1), if possible. + """ + I = self.ring.ideal(a.data) + self.base_ideal + try: + return self(I.in_terms_of_generators(1)[0]) + except ValueError: # 1 not in I + raise NotReversible('%s not a unit in %r' % (a, self)) + + def is_zero(self, a): + return self.base_ideal.contains(a.data) + + def free_module(self, rank): + """ + Generate a free module of rank ``rank`` over ``self``. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> (QQ.old_poly_ring(x)/[x**2 + 1]).free_module(2) + (QQ[x]/)**2 + """ + return FreeModuleQuotientRing(self, rank) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/rationalfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/rationalfield.py new file mode 100644 index 0000000000000000000000000000000000000000..6da570332de8a6d39a21bb3d57447670c7a98441 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/rationalfield.py @@ -0,0 +1,200 @@ +"""Implementation of :class:`RationalField` class. """ + + +from sympy.external.gmpy import MPQ + +from sympy.polys.domains.groundtypes import SymPyRational, is_square, sqrtrem + +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.domains.field import Field +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +@public +class RationalField(Field, CharacteristicZero, SimpleDomain): + r"""Abstract base class for the domain :ref:`QQ`. + + The :py:class:`RationalField` class represents the field of rational + numbers $\mathbb{Q}$ as a :py:class:`~.Domain` in the domain system. + :py:class:`RationalField` is a superclass of + :py:class:`PythonRationalField` and :py:class:`GMPYRationalField` one of + which will be the implementation for :ref:`QQ` depending on whether either + of ``gmpy`` or ``gmpy2`` is installed or not. + + See also + ======== + + Domain + """ + + rep = 'QQ' + alias = 'QQ' + + is_RationalField = is_QQ = True + is_Numerical = True + + has_assoc_Ring = True + has_assoc_Field = True + + dtype = MPQ + zero = dtype(0) + one = dtype(1) + tp = type(one) + + def __init__(self): + pass + + def __eq__(self, other): + """Returns ``True`` if two domains are equivalent. """ + if isinstance(other, RationalField): + return True + else: + return NotImplemented + + def __hash__(self): + """Returns hash code of ``self``. """ + return hash('QQ') + + def get_ring(self): + """Returns ring associated with ``self``. """ + from sympy.polys.domains import ZZ + return ZZ + + def to_sympy(self, a): + """Convert ``a`` to a SymPy object. """ + return SymPyRational(int(a.numerator), int(a.denominator)) + + def from_sympy(self, a): + """Convert SymPy's Integer to ``dtype``. """ + if a.is_Rational: + return MPQ(a.p, a.q) + elif a.is_Float: + from sympy.polys.domains import RR + return MPQ(*map(int, RR.to_rational(a))) + else: + raise CoercionFailed("expected `Rational` object, got %s" % a) + + def algebraic_field(self, *extension, alias=None): + r"""Returns an algebraic field, i.e. `\mathbb{Q}(\alpha, \ldots)`. + + Parameters + ========== + + *extension : One or more :py:class:`~.Expr` + Generators of the extension. These should be expressions that are + algebraic over `\mathbb{Q}`. + + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + If provided, this will be used as the alias symbol for the + primitive element of the returned :py:class:`~.AlgebraicField`. + + Returns + ======= + + :py:class:`~.AlgebraicField` + A :py:class:`~.Domain` representing the algebraic field extension. + + Examples + ======== + + >>> from sympy import QQ, sqrt + >>> QQ.algebraic_field(sqrt(2)) + QQ + """ + from sympy.polys.domains import AlgebraicField + return AlgebraicField(self, *extension, alias=alias) + + def from_AlgebraicField(K1, a, K0): + """Convert a :py:class:`~.ANP` object to :ref:`QQ`. + + See :py:meth:`~.Domain.convert` + """ + if a.is_ground: + return K1.convert(a.LC(), K0.dom) + + def from_ZZ(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return MPQ(a) + + def from_ZZ_python(K1, a, K0): + """Convert a Python ``int`` object to ``dtype``. """ + return MPQ(a) + + def from_QQ(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return MPQ(a.numerator, a.denominator) + + def from_QQ_python(K1, a, K0): + """Convert a Python ``Fraction`` object to ``dtype``. """ + return MPQ(a.numerator, a.denominator) + + def from_ZZ_gmpy(K1, a, K0): + """Convert a GMPY ``mpz`` object to ``dtype``. """ + return MPQ(a) + + def from_QQ_gmpy(K1, a, K0): + """Convert a GMPY ``mpq`` object to ``dtype``. """ + return a + + def from_GaussianRationalField(K1, a, K0): + """Convert a ``GaussianElement`` object to ``dtype``. """ + if a.y == 0: + return MPQ(a.x) + + def from_RealField(K1, a, K0): + """Convert a mpmath ``mpf`` object to ``dtype``. """ + return MPQ(*map(int, K0.to_rational(a))) + + def exquo(self, a, b): + """Exact quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return MPQ(a) / MPQ(b) + + def quo(self, a, b): + """Quotient of ``a`` and ``b``, implies ``__truediv__``. """ + return MPQ(a) / MPQ(b) + + def rem(self, a, b): + """Remainder of ``a`` and ``b``, implies nothing. """ + return self.zero + + def div(self, a, b): + """Division of ``a`` and ``b``, implies ``__truediv__``. """ + return MPQ(a) / MPQ(b), self.zero + + def numer(self, a): + """Returns numerator of ``a``. """ + return a.numerator + + def denom(self, a): + """Returns denominator of ``a``. """ + return a.denominator + + def is_square(self, a): + """Return ``True`` if ``a`` is a square. + + Explanation + =========== + A rational number is a square if and only if there exists + a rational number ``b`` such that ``b * b == a``. + """ + return is_square(a.numerator) and is_square(a.denominator) + + def exsqrt(self, a): + """Non-negative square root of ``a`` if ``a`` is a square. + + See also + ======== + is_square + """ + if a.numerator < 0: # denominator is always positive + return None + p_sqrt, p_rem = sqrtrem(a.numerator) + if p_rem != 0: + return None + q_sqrt, q_rem = sqrtrem(a.denominator) + if q_rem != 0: + return None + return MPQ(p_sqrt, q_sqrt) + +QQ = RationalField() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/realfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/realfield.py new file mode 100644 index 0000000000000000000000000000000000000000..12f543b2619aa238969ecbe20215d6fd59792904 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/realfield.py @@ -0,0 +1,220 @@ +"""Implementation of :class:`RealField` class. """ + + +from sympy.external.gmpy import SYMPY_INTS, MPQ +from sympy.core.numbers import Float +from sympy.polys.domains.field import Field +from sympy.polys.domains.simpledomain import SimpleDomain +from sympy.polys.domains.characteristiczero import CharacteristicZero +from sympy.polys.polyerrors import CoercionFailed +from sympy.utilities import public + +from mpmath import MPContext +from mpmath.libmp import to_rational as _mpmath_to_rational + + +def to_rational(s, max_denom, limit=True): + + p, q = _mpmath_to_rational(s._mpf_) + + # Needed for GROUND_TYPES=flint if gmpy2 is installed because mpmath's + # to_rational() function returns a gmpy2.mpz instance and if MPQ is + # flint.fmpq then MPQ(p, q) will fail. + p = int(p) + q = int(q) + + if not limit or q <= max_denom: + return p, q + + p0, q0, p1, q1 = 0, 1, 1, 0 + n, d = p, q + + while True: + a = n//d + q2 = q0 + a*q1 + if q2 > max_denom: + break + p0, q0, p1, q1 = p1, q1, p0 + a*p1, q2 + n, d = d, n - a*d + + k = (max_denom - q0)//q1 + + number = MPQ(p, q) + bound1 = MPQ(p0 + k*p1, q0 + k*q1) + bound2 = MPQ(p1, q1) + + if not bound2 or not bound1: + return p, q + elif abs(bound2 - number) <= abs(bound1 - number): + return bound2.numerator, bound2.denominator + else: + return bound1.numerator, bound1.denominator + + +@public +class RealField(Field, CharacteristicZero, SimpleDomain): + """Real numbers up to the given precision. """ + + rep = 'RR' + + is_RealField = is_RR = True + + is_Exact = False + is_Numerical = True + is_PID = False + + has_assoc_Ring = False + has_assoc_Field = True + + _default_precision = 53 + + @property + def has_default_precision(self): + return self.precision == self._default_precision + + @property + def precision(self): + return self._context.prec + + @property + def dps(self): + return self._context.dps + + @property + def tolerance(self): + return self._tolerance + + def __init__(self, prec=None, dps=None, tol=None): + # XXX: The tol parameter is ignored but is kept for now for backwards + # compatibility. + + context = MPContext() + + if prec is None and dps is None: + context.prec = self._default_precision + elif dps is None: + context.prec = prec + elif prec is None: + context.dps = dps + else: + raise TypeError("Cannot set both prec and dps") + + self._context = context + + self._dtype = context.mpf + self.zero = self.dtype(0) + self.one = self.dtype(1) + + # Only max_denom here is used for anything and is only used for + # to_rational. + self._max_denom = max(2**context.prec // 200, 99) + self._tolerance = self.one / self._max_denom + + @property + def tp(self): + # XXX: Domain treats tp as an alias of dtype. Here we need to two + # separate things: dtype is a callable to make/convert instances. + # We use tp with isinstance to check if an object is an instance + # of the domain already. + return self._dtype + + def dtype(self, arg): + # XXX: This is needed because mpmath does not recognise fmpz. + # It might be better to add conversion routines to mpmath and if that + # happens then this can be removed. + if isinstance(arg, SYMPY_INTS): + arg = int(arg) + return self._dtype(arg) + + def __eq__(self, other): + return isinstance(other, RealField) and self.precision == other.precision + + def __hash__(self): + return hash((self.__class__.__name__, self._dtype, self.precision)) + + def to_sympy(self, element): + """Convert ``element`` to SymPy number. """ + return Float(element, self.dps) + + def from_sympy(self, expr): + """Convert SymPy's number to ``dtype``. """ + number = expr.evalf(n=self.dps) + + if number.is_Number: + return self.dtype(number) + else: + raise CoercionFailed("expected real number, got %s" % expr) + + def from_ZZ(self, element, base): + return self.dtype(element) + + def from_ZZ_python(self, element, base): + return self.dtype(element) + + def from_ZZ_gmpy(self, element, base): + return self.dtype(int(element)) + + # XXX: We need to convert the denominators to int here because mpmath does + # not recognise mpz. Ideally mpmath would handle this and if it changed to + # do so then the calls to int here could be removed. + + def from_QQ(self, element, base): + return self.dtype(element.numerator) / int(element.denominator) + + def from_QQ_python(self, element, base): + return self.dtype(element.numerator) / int(element.denominator) + + def from_QQ_gmpy(self, element, base): + return self.dtype(int(element.numerator)) / int(element.denominator) + + def from_AlgebraicField(self, element, base): + return self.from_sympy(base.to_sympy(element).evalf(self.dps)) + + def from_RealField(self, element, base): + return self.dtype(element) + + def from_ComplexField(self, element, base): + if not element.imag: + return self.dtype(element.real) + + def to_rational(self, element, limit=True): + """Convert a real number to rational number. """ + return to_rational(element, self._max_denom, limit=limit) + + def get_ring(self): + """Returns a ring associated with ``self``. """ + return self + + def get_exact(self): + """Returns an exact domain associated with ``self``. """ + from sympy.polys.domains import QQ + return QQ + + def gcd(self, a, b): + """Returns GCD of ``a`` and ``b``. """ + return self.one + + def lcm(self, a, b): + """Returns LCM of ``a`` and ``b``. """ + return a*b + + def almosteq(self, a, b, tolerance=None): + """Check if ``a`` and ``b`` are almost equal. """ + return self._context.almosteq(a, b, tolerance) + + def is_square(self, a): + """Returns ``True`` if ``a >= 0`` and ``False`` otherwise. """ + return a >= 0 + + def exsqrt(self, a): + """Non-negative square root for ``a >= 0`` and ``None`` otherwise. + + Explanation + =========== + The square root may be slightly inaccurate due to floating point + rounding error. + """ + return a ** 0.5 if a >= 0 else None + + +RR = RealField() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/ring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/ring.py new file mode 100644 index 0000000000000000000000000000000000000000..c69e6944d8f51e4b319609368a476e6e847ae126 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/ring.py @@ -0,0 +1,118 @@ +"""Implementation of :class:`Ring` class. """ + + +from sympy.polys.domains.domain import Domain +from sympy.polys.polyerrors import ExactQuotientFailed, NotInvertible, NotReversible + +from sympy.utilities import public + +@public +class Ring(Domain): + """Represents a ring domain. """ + + is_Ring = True + + def get_ring(self): + """Returns a ring associated with ``self``. """ + return self + + def exquo(self, a, b): + """Exact quotient of ``a`` and ``b``, implies ``__floordiv__``. """ + if a % b: + raise ExactQuotientFailed(a, b, self) + else: + return a // b + + def quo(self, a, b): + """Quotient of ``a`` and ``b``, implies ``__floordiv__``. """ + return a // b + + def rem(self, a, b): + """Remainder of ``a`` and ``b``, implies ``__mod__``. """ + return a % b + + def div(self, a, b): + """Division of ``a`` and ``b``, implies ``__divmod__``. """ + return divmod(a, b) + + def invert(self, a, b): + """Returns inversion of ``a mod b``. """ + s, t, h = self.gcdex(a, b) + + if self.is_one(h): + return s % b + else: + raise NotInvertible("zero divisor") + + def revert(self, a): + """Returns ``a**(-1)`` if possible. """ + if self.is_one(a) or self.is_one(-a): + return a + else: + raise NotReversible('only units are reversible in a ring') + + def is_unit(self, a): + try: + self.revert(a) + return True + except NotReversible: + return False + + def numer(self, a): + """Returns numerator of ``a``. """ + return a + + def denom(self, a): + """Returns denominator of `a`. """ + return self.one + + def free_module(self, rank): + """ + Generate a free module of rank ``rank`` over self. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).free_module(2) + QQ[x]**2 + """ + raise NotImplementedError + + def ideal(self, *gens): + """ + Generate an ideal of ``self``. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).ideal(x**2) + + """ + from sympy.polys.agca.ideals import ModuleImplementedIdeal + return ModuleImplementedIdeal(self, self.free_module(1).submodule( + *[[x] for x in gens])) + + def quotient_ring(self, e): + """ + Form a quotient ring of ``self``. + + Here ``e`` can be an ideal or an iterable. + + >>> from sympy.abc import x + >>> from sympy import QQ + >>> QQ.old_poly_ring(x).quotient_ring(QQ.old_poly_ring(x).ideal(x**2)) + QQ[x]/ + >>> QQ.old_poly_ring(x).quotient_ring([x**2]) + QQ[x]/ + + The division operator has been overloaded for this: + + >>> QQ.old_poly_ring(x)/[x**2] + QQ[x]/ + """ + from sympy.polys.agca.ideals import Ideal + from sympy.polys.domains.quotientring import QuotientRing + if not isinstance(e, Ideal): + e = self.ideal(*e) + return QuotientRing(self, e) + + def __truediv__(self, e): + return self.quotient_ring(e) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/simpledomain.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/simpledomain.py new file mode 100644 index 0000000000000000000000000000000000000000..88cf634555d8bd9229d7fc511af3cf96fececbb8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/simpledomain.py @@ -0,0 +1,15 @@ +"""Implementation of :class:`SimpleDomain` class. """ + + +from sympy.polys.domains.domain import Domain +from sympy.utilities import public + +@public +class SimpleDomain(Domain): + """Base class for simple domains, e.g. ZZ, QQ. """ + + is_Simple = True + + def inject(self, *gens): + """Inject generators into this domain. """ + return self.poly_ring(*gens) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_domains.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_domains.py new file mode 100644 index 0000000000000000000000000000000000000000..403cb37a4f093517183345f0b53fc5253f6756bd --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_domains.py @@ -0,0 +1,1434 @@ +"""Tests for classes defining properties of ground domains, e.g. ZZ, QQ, ZZ[x] ... """ + +from sympy.external.gmpy import GROUND_TYPES + +from sympy.core.numbers import (AlgebraicNumber, E, Float, I, Integer, + Rational, oo, pi, _illegal) +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.polys.polytools import Poly +from sympy.abc import x, y, z + +from sympy.polys.domains import (ZZ, QQ, RR, CC, FF, GF, EX, EXRAW, ZZ_gmpy, + ZZ_python, QQ_gmpy, QQ_python) +from sympy.polys.domains.algebraicfield import AlgebraicField +from sympy.polys.domains.gaussiandomains import ZZ_I, QQ_I +from sympy.polys.domains.polynomialring import PolynomialRing +from sympy.polys.domains.realfield import RealField + +from sympy.polys.numberfields.subfield import field_isomorphism +from sympy.polys.rings import ring, PolyElement +from sympy.polys.specialpolys import cyclotomic_poly +from sympy.polys.fields import field, FracElement + +from sympy.polys.agca.extensions import FiniteExtension + +from sympy.polys.polyerrors import ( + UnificationFailed, + GeneratorsError, + CoercionFailed, + NotInvertible, + DomainError) + +from sympy.testing.pytest import raises, warns_deprecated_sympy + +from itertools import product + +ALG = QQ.algebraic_field(sqrt(2), sqrt(3)) + +def unify(K0, K1): + return K0.unify(K1) + +def test_Domain_unify(): + F3 = GF(3) + F5 = GF(5) + + assert unify(F3, F3) == F3 + raises(UnificationFailed, lambda: unify(F3, ZZ)) + raises(UnificationFailed, lambda: unify(F3, QQ)) + raises(UnificationFailed, lambda: unify(F3, ZZ_I)) + raises(UnificationFailed, lambda: unify(F3, QQ_I)) + raises(UnificationFailed, lambda: unify(F3, ALG)) + raises(UnificationFailed, lambda: unify(F3, RR)) + raises(UnificationFailed, lambda: unify(F3, CC)) + raises(UnificationFailed, lambda: unify(F3, ZZ[x])) + raises(UnificationFailed, lambda: unify(F3, ZZ.frac_field(x))) + raises(UnificationFailed, lambda: unify(F3, EX)) + + assert unify(F5, F5) == F5 + raises(UnificationFailed, lambda: unify(F5, F3)) + raises(UnificationFailed, lambda: unify(F5, F3[x])) + raises(UnificationFailed, lambda: unify(F5, F3.frac_field(x))) + + raises(UnificationFailed, lambda: unify(ZZ, F3)) + assert unify(ZZ, ZZ) == ZZ + assert unify(ZZ, QQ) == QQ + assert unify(ZZ, ALG) == ALG + assert unify(ZZ, RR) == RR + assert unify(ZZ, CC) == CC + assert unify(ZZ, ZZ[x]) == ZZ[x] + assert unify(ZZ, ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(ZZ, EX) == EX + + raises(UnificationFailed, lambda: unify(QQ, F3)) + assert unify(QQ, ZZ) == QQ + assert unify(QQ, QQ) == QQ + assert unify(QQ, ALG) == ALG + assert unify(QQ, RR) == RR + assert unify(QQ, CC) == CC + assert unify(QQ, ZZ[x]) == QQ[x] + assert unify(QQ, ZZ.frac_field(x)) == QQ.frac_field(x) + assert unify(QQ, EX) == EX + + raises(UnificationFailed, lambda: unify(ZZ_I, F3)) + assert unify(ZZ_I, ZZ) == ZZ_I + assert unify(ZZ_I, ZZ_I) == ZZ_I + assert unify(ZZ_I, QQ) == QQ_I + assert unify(ZZ_I, ALG) == QQ.algebraic_field(I, sqrt(2), sqrt(3)) + assert unify(ZZ_I, RR) == CC + assert unify(ZZ_I, CC) == CC + assert unify(ZZ_I, ZZ[x]) == ZZ_I[x] + assert unify(ZZ_I, ZZ_I[x]) == ZZ_I[x] + assert unify(ZZ_I, ZZ.frac_field(x)) == ZZ_I.frac_field(x) + assert unify(ZZ_I, ZZ_I.frac_field(x)) == ZZ_I.frac_field(x) + assert unify(ZZ_I, EX) == EX + + raises(UnificationFailed, lambda: unify(QQ_I, F3)) + assert unify(QQ_I, ZZ) == QQ_I + assert unify(QQ_I, ZZ_I) == QQ_I + assert unify(QQ_I, QQ) == QQ_I + assert unify(QQ_I, ALG) == QQ.algebraic_field(I, sqrt(2), sqrt(3)) + assert unify(QQ_I, RR) == CC + assert unify(QQ_I, CC) == CC + assert unify(QQ_I, ZZ[x]) == QQ_I[x] + assert unify(QQ_I, ZZ_I[x]) == QQ_I[x] + assert unify(QQ_I, QQ[x]) == QQ_I[x] + assert unify(QQ_I, QQ_I[x]) == QQ_I[x] + assert unify(QQ_I, ZZ.frac_field(x)) == QQ_I.frac_field(x) + assert unify(QQ_I, ZZ_I.frac_field(x)) == QQ_I.frac_field(x) + assert unify(QQ_I, QQ.frac_field(x)) == QQ_I.frac_field(x) + assert unify(QQ_I, QQ_I.frac_field(x)) == QQ_I.frac_field(x) + assert unify(QQ_I, EX) == EX + + raises(UnificationFailed, lambda: unify(RR, F3)) + assert unify(RR, ZZ) == RR + assert unify(RR, QQ) == RR + assert unify(RR, ALG) == RR + assert unify(RR, RR) == RR + assert unify(RR, CC) == CC + assert unify(RR, ZZ[x]) == RR[x] + assert unify(RR, ZZ.frac_field(x)) == RR.frac_field(x) + assert unify(RR, EX) == EX + assert RR[x].unify(ZZ.frac_field(y)) == RR.frac_field(x, y) + + raises(UnificationFailed, lambda: unify(CC, F3)) + assert unify(CC, ZZ) == CC + assert unify(CC, QQ) == CC + assert unify(CC, ALG) == CC + assert unify(CC, RR) == CC + assert unify(CC, CC) == CC + assert unify(CC, ZZ[x]) == CC[x] + assert unify(CC, ZZ.frac_field(x)) == CC.frac_field(x) + assert unify(CC, EX) == EX + + raises(UnificationFailed, lambda: unify(ZZ[x], F3)) + assert unify(ZZ[x], ZZ) == ZZ[x] + assert unify(ZZ[x], QQ) == QQ[x] + assert unify(ZZ[x], ALG) == ALG[x] + assert unify(ZZ[x], RR) == RR[x] + assert unify(ZZ[x], CC) == CC[x] + assert unify(ZZ[x], ZZ[x]) == ZZ[x] + assert unify(ZZ[x], ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(ZZ[x], EX) == EX + + raises(UnificationFailed, lambda: unify(ZZ.frac_field(x), F3)) + assert unify(ZZ.frac_field(x), ZZ) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), QQ) == QQ.frac_field(x) + assert unify(ZZ.frac_field(x), ALG) == ALG.frac_field(x) + assert unify(ZZ.frac_field(x), RR) == RR.frac_field(x) + assert unify(ZZ.frac_field(x), CC) == CC.frac_field(x) + assert unify(ZZ.frac_field(x), ZZ[x]) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), EX) == EX + + raises(UnificationFailed, lambda: unify(EX, F3)) + assert unify(EX, ZZ) == EX + assert unify(EX, QQ) == EX + assert unify(EX, ALG) == EX + assert unify(EX, RR) == EX + assert unify(EX, CC) == EX + assert unify(EX, ZZ[x]) == EX + assert unify(EX, ZZ.frac_field(x)) == EX + assert unify(EX, EX) == EX + +def test_Domain_unify_composite(): + assert unify(ZZ.poly_ring(x), ZZ) == ZZ.poly_ring(x) + assert unify(ZZ.poly_ring(x), QQ) == QQ.poly_ring(x) + assert unify(QQ.poly_ring(x), ZZ) == QQ.poly_ring(x) + assert unify(QQ.poly_ring(x), QQ) == QQ.poly_ring(x) + + assert unify(ZZ, ZZ.poly_ring(x)) == ZZ.poly_ring(x) + assert unify(QQ, ZZ.poly_ring(x)) == QQ.poly_ring(x) + assert unify(ZZ, QQ.poly_ring(x)) == QQ.poly_ring(x) + assert unify(QQ, QQ.poly_ring(x)) == QQ.poly_ring(x) + + assert unify(ZZ.poly_ring(x, y), ZZ) == ZZ.poly_ring(x, y) + assert unify(ZZ.poly_ring(x, y), QQ) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x, y), ZZ) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x, y), QQ) == QQ.poly_ring(x, y) + + assert unify(ZZ, ZZ.poly_ring(x, y)) == ZZ.poly_ring(x, y) + assert unify(QQ, ZZ.poly_ring(x, y)) == QQ.poly_ring(x, y) + assert unify(ZZ, QQ.poly_ring(x, y)) == QQ.poly_ring(x, y) + assert unify(QQ, QQ.poly_ring(x, y)) == QQ.poly_ring(x, y) + + assert unify(ZZ.frac_field(x), ZZ) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), QQ) == QQ.frac_field(x) + assert unify(QQ.frac_field(x), ZZ) == QQ.frac_field(x) + assert unify(QQ.frac_field(x), QQ) == QQ.frac_field(x) + + assert unify(ZZ, ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(QQ, ZZ.frac_field(x)) == QQ.frac_field(x) + assert unify(ZZ, QQ.frac_field(x)) == QQ.frac_field(x) + assert unify(QQ, QQ.frac_field(x)) == QQ.frac_field(x) + + assert unify(ZZ.frac_field(x, y), ZZ) == ZZ.frac_field(x, y) + assert unify(ZZ.frac_field(x, y), QQ) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), ZZ) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), QQ) == QQ.frac_field(x, y) + + assert unify(ZZ, ZZ.frac_field(x, y)) == ZZ.frac_field(x, y) + assert unify(QQ, ZZ.frac_field(x, y)) == QQ.frac_field(x, y) + assert unify(ZZ, QQ.frac_field(x, y)) == QQ.frac_field(x, y) + assert unify(QQ, QQ.frac_field(x, y)) == QQ.frac_field(x, y) + + assert unify(ZZ.poly_ring(x), ZZ.poly_ring(x)) == ZZ.poly_ring(x) + assert unify(ZZ.poly_ring(x), QQ.poly_ring(x)) == QQ.poly_ring(x) + assert unify(QQ.poly_ring(x), ZZ.poly_ring(x)) == QQ.poly_ring(x) + assert unify(QQ.poly_ring(x), QQ.poly_ring(x)) == QQ.poly_ring(x) + + assert unify(ZZ.poly_ring(x, y), ZZ.poly_ring(x)) == ZZ.poly_ring(x, y) + assert unify(ZZ.poly_ring(x, y), QQ.poly_ring(x)) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x, y), ZZ.poly_ring(x)) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x, y), QQ.poly_ring(x)) == QQ.poly_ring(x, y) + + assert unify(ZZ.poly_ring(x), ZZ.poly_ring(x, y)) == ZZ.poly_ring(x, y) + assert unify(ZZ.poly_ring(x), QQ.poly_ring(x, y)) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x), ZZ.poly_ring(x, y)) == QQ.poly_ring(x, y) + assert unify(QQ.poly_ring(x), QQ.poly_ring(x, y)) == QQ.poly_ring(x, y) + + assert unify(ZZ.poly_ring(x, y), ZZ.poly_ring(x, z)) == ZZ.poly_ring(x, y, z) + assert unify(ZZ.poly_ring(x, y), QQ.poly_ring(x, z)) == QQ.poly_ring(x, y, z) + assert unify(QQ.poly_ring(x, y), ZZ.poly_ring(x, z)) == QQ.poly_ring(x, y, z) + assert unify(QQ.poly_ring(x, y), QQ.poly_ring(x, z)) == QQ.poly_ring(x, y, z) + + assert unify(ZZ.frac_field(x), ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), QQ.frac_field(x)) == QQ.frac_field(x) + assert unify(QQ.frac_field(x), ZZ.frac_field(x)) == QQ.frac_field(x) + assert unify(QQ.frac_field(x), QQ.frac_field(x)) == QQ.frac_field(x) + + assert unify(ZZ.frac_field(x, y), ZZ.frac_field(x)) == ZZ.frac_field(x, y) + assert unify(ZZ.frac_field(x, y), QQ.frac_field(x)) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), ZZ.frac_field(x)) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), QQ.frac_field(x)) == QQ.frac_field(x, y) + + assert unify(ZZ.frac_field(x), ZZ.frac_field(x, y)) == ZZ.frac_field(x, y) + assert unify(ZZ.frac_field(x), QQ.frac_field(x, y)) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x), ZZ.frac_field(x, y)) == QQ.frac_field(x, y) + assert unify(QQ.frac_field(x), QQ.frac_field(x, y)) == QQ.frac_field(x, y) + + assert unify(ZZ.frac_field(x, y), ZZ.frac_field(x, z)) == ZZ.frac_field(x, y, z) + assert unify(ZZ.frac_field(x, y), QQ.frac_field(x, z)) == QQ.frac_field(x, y, z) + assert unify(QQ.frac_field(x, y), ZZ.frac_field(x, z)) == QQ.frac_field(x, y, z) + assert unify(QQ.frac_field(x, y), QQ.frac_field(x, z)) == QQ.frac_field(x, y, z) + + assert unify(ZZ.poly_ring(x), ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(ZZ.poly_ring(x), QQ.frac_field(x)) == ZZ.frac_field(x) + assert unify(QQ.poly_ring(x), ZZ.frac_field(x)) == ZZ.frac_field(x) + assert unify(QQ.poly_ring(x), QQ.frac_field(x)) == QQ.frac_field(x) + + assert unify(ZZ.poly_ring(x, y), ZZ.frac_field(x)) == ZZ.frac_field(x, y) + assert unify(ZZ.poly_ring(x, y), QQ.frac_field(x)) == ZZ.frac_field(x, y) + assert unify(QQ.poly_ring(x, y), ZZ.frac_field(x)) == ZZ.frac_field(x, y) + assert unify(QQ.poly_ring(x, y), QQ.frac_field(x)) == QQ.frac_field(x, y) + + assert unify(ZZ.poly_ring(x), ZZ.frac_field(x, y)) == ZZ.frac_field(x, y) + assert unify(ZZ.poly_ring(x), QQ.frac_field(x, y)) == ZZ.frac_field(x, y) + assert unify(QQ.poly_ring(x), ZZ.frac_field(x, y)) == ZZ.frac_field(x, y) + assert unify(QQ.poly_ring(x), QQ.frac_field(x, y)) == QQ.frac_field(x, y) + + assert unify(ZZ.poly_ring(x, y), ZZ.frac_field(x, z)) == ZZ.frac_field(x, y, z) + assert unify(ZZ.poly_ring(x, y), QQ.frac_field(x, z)) == ZZ.frac_field(x, y, z) + assert unify(QQ.poly_ring(x, y), ZZ.frac_field(x, z)) == ZZ.frac_field(x, y, z) + assert unify(QQ.poly_ring(x, y), QQ.frac_field(x, z)) == QQ.frac_field(x, y, z) + + assert unify(ZZ.frac_field(x), ZZ.poly_ring(x)) == ZZ.frac_field(x) + assert unify(ZZ.frac_field(x), QQ.poly_ring(x)) == ZZ.frac_field(x) + assert unify(QQ.frac_field(x), ZZ.poly_ring(x)) == ZZ.frac_field(x) + assert unify(QQ.frac_field(x), QQ.poly_ring(x)) == QQ.frac_field(x) + + assert unify(ZZ.frac_field(x, y), ZZ.poly_ring(x)) == ZZ.frac_field(x, y) + assert unify(ZZ.frac_field(x, y), QQ.poly_ring(x)) == ZZ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), ZZ.poly_ring(x)) == ZZ.frac_field(x, y) + assert unify(QQ.frac_field(x, y), QQ.poly_ring(x)) == QQ.frac_field(x, y) + + assert unify(ZZ.frac_field(x), ZZ.poly_ring(x, y)) == ZZ.frac_field(x, y) + assert unify(ZZ.frac_field(x), QQ.poly_ring(x, y)) == ZZ.frac_field(x, y) + assert unify(QQ.frac_field(x), ZZ.poly_ring(x, y)) == ZZ.frac_field(x, y) + assert unify(QQ.frac_field(x), QQ.poly_ring(x, y)) == QQ.frac_field(x, y) + + assert unify(ZZ.frac_field(x, y), ZZ.poly_ring(x, z)) == ZZ.frac_field(x, y, z) + assert unify(ZZ.frac_field(x, y), QQ.poly_ring(x, z)) == ZZ.frac_field(x, y, z) + assert unify(QQ.frac_field(x, y), ZZ.poly_ring(x, z)) == ZZ.frac_field(x, y, z) + assert unify(QQ.frac_field(x, y), QQ.poly_ring(x, z)) == QQ.frac_field(x, y, z) + +def test_Domain_unify_algebraic(): + sqrt5 = QQ.algebraic_field(sqrt(5)) + sqrt7 = QQ.algebraic_field(sqrt(7)) + sqrt57 = QQ.algebraic_field(sqrt(5), sqrt(7)) + + assert sqrt5.unify(sqrt7) == sqrt57 + + assert sqrt5.unify(sqrt5[x, y]) == sqrt5[x, y] + assert sqrt5[x, y].unify(sqrt5) == sqrt5[x, y] + + assert sqrt5.unify(sqrt5.frac_field(x, y)) == sqrt5.frac_field(x, y) + assert sqrt5.frac_field(x, y).unify(sqrt5) == sqrt5.frac_field(x, y) + + assert sqrt5.unify(sqrt7[x, y]) == sqrt57[x, y] + assert sqrt5[x, y].unify(sqrt7) == sqrt57[x, y] + + assert sqrt5.unify(sqrt7.frac_field(x, y)) == sqrt57.frac_field(x, y) + assert sqrt5.frac_field(x, y).unify(sqrt7) == sqrt57.frac_field(x, y) + +def test_Domain_unify_FiniteExtension(): + KxZZ = FiniteExtension(Poly(x**2 - 2, x, domain=ZZ)) + KxQQ = FiniteExtension(Poly(x**2 - 2, x, domain=QQ)) + KxZZy = FiniteExtension(Poly(x**2 - 2, x, domain=ZZ[y])) + KxQQy = FiniteExtension(Poly(x**2 - 2, x, domain=QQ[y])) + + assert KxZZ.unify(KxZZ) == KxZZ + assert KxQQ.unify(KxQQ) == KxQQ + assert KxZZy.unify(KxZZy) == KxZZy + assert KxQQy.unify(KxQQy) == KxQQy + + assert KxZZ.unify(ZZ) == KxZZ + assert KxZZ.unify(QQ) == KxQQ + assert KxQQ.unify(ZZ) == KxQQ + assert KxQQ.unify(QQ) == KxQQ + + assert KxZZ.unify(ZZ[y]) == KxZZy + assert KxZZ.unify(QQ[y]) == KxQQy + assert KxQQ.unify(ZZ[y]) == KxQQy + assert KxQQ.unify(QQ[y]) == KxQQy + + assert KxZZy.unify(ZZ) == KxZZy + assert KxZZy.unify(QQ) == KxQQy + assert KxQQy.unify(ZZ) == KxQQy + assert KxQQy.unify(QQ) == KxQQy + + assert KxZZy.unify(ZZ[y]) == KxZZy + assert KxZZy.unify(QQ[y]) == KxQQy + assert KxQQy.unify(ZZ[y]) == KxQQy + assert KxQQy.unify(QQ[y]) == KxQQy + + K = FiniteExtension(Poly(x**2 - 2, x, domain=ZZ[y])) + assert K.unify(ZZ) == K + assert K.unify(ZZ[x]) == K + assert K.unify(ZZ[y]) == K + assert K.unify(ZZ[x, y]) == K + + Kz = FiniteExtension(Poly(x**2 - 2, x, domain=ZZ[y, z])) + assert K.unify(ZZ[z]) == Kz + assert K.unify(ZZ[x, z]) == Kz + assert K.unify(ZZ[y, z]) == Kz + assert K.unify(ZZ[x, y, z]) == Kz + + Kx = FiniteExtension(Poly(x**2 - 2, x, domain=ZZ)) + Ky = FiniteExtension(Poly(y**2 - 2, y, domain=ZZ)) + Kxy = FiniteExtension(Poly(y**2 - 2, y, domain=Kx)) + assert Kx.unify(Kx) == Kx + assert Ky.unify(Ky) == Ky + assert Kx.unify(Ky) == Kxy + assert Ky.unify(Kx) == Kxy + +def test_Domain_unify_with_symbols(): + raises(UnificationFailed, lambda: ZZ[x, y].unify_with_symbols(ZZ, (y, z))) + raises(UnificationFailed, lambda: ZZ.unify_with_symbols(ZZ[x, y], (y, z))) + +def test_Domain__contains__(): + assert (0 in EX) is True + assert (0 in ZZ) is True + assert (0 in QQ) is True + assert (0 in RR) is True + assert (0 in CC) is True + assert (0 in ALG) is True + assert (0 in ZZ[x, y]) is True + assert (0 in QQ[x, y]) is True + assert (0 in RR[x, y]) is True + + assert (-7 in EX) is True + assert (-7 in ZZ) is True + assert (-7 in QQ) is True + assert (-7 in RR) is True + assert (-7 in CC) is True + assert (-7 in ALG) is True + assert (-7 in ZZ[x, y]) is True + assert (-7 in QQ[x, y]) is True + assert (-7 in RR[x, y]) is True + + assert (17 in EX) is True + assert (17 in ZZ) is True + assert (17 in QQ) is True + assert (17 in RR) is True + assert (17 in CC) is True + assert (17 in ALG) is True + assert (17 in ZZ[x, y]) is True + assert (17 in QQ[x, y]) is True + assert (17 in RR[x, y]) is True + + assert (Rational(-1, 7) in EX) is True + assert (Rational(-1, 7) in ZZ) is False + assert (Rational(-1, 7) in QQ) is True + assert (Rational(-1, 7) in RR) is True + assert (Rational(-1, 7) in CC) is True + assert (Rational(-1, 7) in ALG) is True + assert (Rational(-1, 7) in ZZ[x, y]) is False + assert (Rational(-1, 7) in QQ[x, y]) is True + assert (Rational(-1, 7) in RR[x, y]) is True + + assert (Rational(3, 5) in EX) is True + assert (Rational(3, 5) in ZZ) is False + assert (Rational(3, 5) in QQ) is True + assert (Rational(3, 5) in RR) is True + assert (Rational(3, 5) in CC) is True + assert (Rational(3, 5) in ALG) is True + assert (Rational(3, 5) in ZZ[x, y]) is False + assert (Rational(3, 5) in QQ[x, y]) is True + assert (Rational(3, 5) in RR[x, y]) is True + + assert (3.0 in EX) is True + assert (3.0 in ZZ) is True + assert (3.0 in QQ) is True + assert (3.0 in RR) is True + assert (3.0 in CC) is True + assert (3.0 in ALG) is True + assert (3.0 in ZZ[x, y]) is True + assert (3.0 in QQ[x, y]) is True + assert (3.0 in RR[x, y]) is True + + assert (3.14 in EX) is True + assert (3.14 in ZZ) is False + assert (3.14 in QQ) is True + assert (3.14 in RR) is True + assert (3.14 in CC) is True + assert (3.14 in ALG) is True + assert (3.14 in ZZ[x, y]) is False + assert (3.14 in QQ[x, y]) is True + assert (3.14 in RR[x, y]) is True + + assert (oo in ALG) is False + assert (oo in ZZ[x, y]) is False + assert (oo in QQ[x, y]) is False + + assert (-oo in ZZ) is False + assert (-oo in QQ) is False + assert (-oo in ALG) is False + assert (-oo in ZZ[x, y]) is False + assert (-oo in QQ[x, y]) is False + + assert (sqrt(7) in EX) is True + assert (sqrt(7) in ZZ) is False + assert (sqrt(7) in QQ) is False + assert (sqrt(7) in RR) is True + assert (sqrt(7) in CC) is True + assert (sqrt(7) in ALG) is False + assert (sqrt(7) in ZZ[x, y]) is False + assert (sqrt(7) in QQ[x, y]) is False + assert (sqrt(7) in RR[x, y]) is True + + assert (2*sqrt(3) + 1 in EX) is True + assert (2*sqrt(3) + 1 in ZZ) is False + assert (2*sqrt(3) + 1 in QQ) is False + assert (2*sqrt(3) + 1 in RR) is True + assert (2*sqrt(3) + 1 in CC) is True + assert (2*sqrt(3) + 1 in ALG) is True + assert (2*sqrt(3) + 1 in ZZ[x, y]) is False + assert (2*sqrt(3) + 1 in QQ[x, y]) is False + assert (2*sqrt(3) + 1 in RR[x, y]) is True + + assert (sin(1) in EX) is True + assert (sin(1) in ZZ) is False + assert (sin(1) in QQ) is False + assert (sin(1) in RR) is True + assert (sin(1) in CC) is True + assert (sin(1) in ALG) is False + assert (sin(1) in ZZ[x, y]) is False + assert (sin(1) in QQ[x, y]) is False + assert (sin(1) in RR[x, y]) is True + + assert (x**2 + 1 in EX) is True + assert (x**2 + 1 in ZZ) is False + assert (x**2 + 1 in QQ) is False + assert (x**2 + 1 in RR) is False + assert (x**2 + 1 in CC) is False + assert (x**2 + 1 in ALG) is False + assert (x**2 + 1 in ZZ[x]) is True + assert (x**2 + 1 in QQ[x]) is True + assert (x**2 + 1 in RR[x]) is True + assert (x**2 + 1 in ZZ[x, y]) is True + assert (x**2 + 1 in QQ[x, y]) is True + assert (x**2 + 1 in RR[x, y]) is True + + assert (x**2 + y**2 in EX) is True + assert (x**2 + y**2 in ZZ) is False + assert (x**2 + y**2 in QQ) is False + assert (x**2 + y**2 in RR) is False + assert (x**2 + y**2 in CC) is False + assert (x**2 + y**2 in ALG) is False + assert (x**2 + y**2 in ZZ[x]) is False + assert (x**2 + y**2 in QQ[x]) is False + assert (x**2 + y**2 in RR[x]) is False + assert (x**2 + y**2 in ZZ[x, y]) is True + assert (x**2 + y**2 in QQ[x, y]) is True + assert (x**2 + y**2 in RR[x, y]) is True + + assert (Rational(3, 2)*x/(y + 1) - z in QQ[x, y, z]) is False + + +def test_issue_14433(): + assert (Rational(2, 3)*x in QQ.frac_field(1/x)) is True + assert (1/x in QQ.frac_field(x)) is True + assert ((x**2 + y**2) in QQ.frac_field(1/x, 1/y)) is True + assert ((x + y) in QQ.frac_field(1/x, y)) is True + assert ((x - y) in QQ.frac_field(x, 1/y)) is True + + +def test_Domain_is_field(): + assert ZZ.is_Field is False + assert GF(5).is_Field is True + assert GF(6).is_Field is False + assert QQ.is_Field is True + assert RR.is_Field is True + assert CC.is_Field is True + assert EX.is_Field is True + assert ALG.is_Field is True + assert QQ[x].is_Field is False + assert ZZ.frac_field(x).is_Field is True + + +def test_Domain_get_ring(): + assert ZZ.has_assoc_Ring is True + assert QQ.has_assoc_Ring is True + assert ZZ[x].has_assoc_Ring is True + assert QQ[x].has_assoc_Ring is True + assert ZZ[x, y].has_assoc_Ring is True + assert QQ[x, y].has_assoc_Ring is True + assert ZZ.frac_field(x).has_assoc_Ring is True + assert QQ.frac_field(x).has_assoc_Ring is True + assert ZZ.frac_field(x, y).has_assoc_Ring is True + assert QQ.frac_field(x, y).has_assoc_Ring is True + + assert EX.has_assoc_Ring is False + assert RR.has_assoc_Ring is False + assert ALG.has_assoc_Ring is False + + assert ZZ.get_ring() == ZZ + assert QQ.get_ring() == ZZ + assert ZZ[x].get_ring() == ZZ[x] + assert QQ[x].get_ring() == QQ[x] + assert ZZ[x, y].get_ring() == ZZ[x, y] + assert QQ[x, y].get_ring() == QQ[x, y] + assert ZZ.frac_field(x).get_ring() == ZZ[x] + assert QQ.frac_field(x).get_ring() == QQ[x] + assert ZZ.frac_field(x, y).get_ring() == ZZ[x, y] + assert QQ.frac_field(x, y).get_ring() == QQ[x, y] + + assert EX.get_ring() == EX + + assert RR.get_ring() == RR + # XXX: This should also be like RR + raises(DomainError, lambda: ALG.get_ring()) + + +def test_Domain_get_field(): + assert EX.has_assoc_Field is True + assert ZZ.has_assoc_Field is True + assert QQ.has_assoc_Field is True + assert RR.has_assoc_Field is True + assert ALG.has_assoc_Field is True + assert ZZ[x].has_assoc_Field is True + assert QQ[x].has_assoc_Field is True + assert ZZ[x, y].has_assoc_Field is True + assert QQ[x, y].has_assoc_Field is True + + assert EX.get_field() == EX + assert ZZ.get_field() == QQ + assert QQ.get_field() == QQ + assert RR.get_field() == RR + assert ALG.get_field() == ALG + assert ZZ[x].get_field() == ZZ.frac_field(x) + assert QQ[x].get_field() == QQ.frac_field(x) + assert ZZ[x, y].get_field() == ZZ.frac_field(x, y) + assert QQ[x, y].get_field() == QQ.frac_field(x, y) + + +def test_Domain_set_domain(): + doms = [GF(5), ZZ, QQ, ALG, RR, CC, EX, ZZ[z], QQ[z], RR[z], CC[z], EX[z]] + for D1 in doms: + for D2 in doms: + assert D1[x].set_domain(D2) == D2[x] + assert D1[x, y].set_domain(D2) == D2[x, y] + assert D1.frac_field(x).set_domain(D2) == D2.frac_field(x) + assert D1.frac_field(x, y).set_domain(D2) == D2.frac_field(x, y) + assert D1.old_poly_ring(x).set_domain(D2) == D2.old_poly_ring(x) + assert D1.old_poly_ring(x, y).set_domain(D2) == D2.old_poly_ring(x, y) + assert D1.old_frac_field(x).set_domain(D2) == D2.old_frac_field(x) + assert D1.old_frac_field(x, y).set_domain(D2) == D2.old_frac_field(x, y) + + +def test_Domain_is_Exact(): + exact = [GF(5), ZZ, QQ, ALG, EX] + inexact = [RR, CC] + for D in exact + inexact: + for R in D, D[x], D.frac_field(x), D.old_poly_ring(x), D.old_frac_field(x): + if D in exact: + assert R.is_Exact is True + else: + assert R.is_Exact is False + + +def test_Domain_get_exact(): + assert EX.get_exact() == EX + assert ZZ.get_exact() == ZZ + assert QQ.get_exact() == QQ + assert RR.get_exact() == QQ + assert CC.get_exact() == QQ_I + assert ALG.get_exact() == ALG + assert ZZ[x].get_exact() == ZZ[x] + assert QQ[x].get_exact() == QQ[x] + assert RR[x].get_exact() == QQ[x] + assert CC[x].get_exact() == QQ_I[x] + assert ZZ[x, y].get_exact() == ZZ[x, y] + assert QQ[x, y].get_exact() == QQ[x, y] + assert RR[x, y].get_exact() == QQ[x, y] + assert CC[x, y].get_exact() == QQ_I[x, y] + assert ZZ.frac_field(x).get_exact() == ZZ.frac_field(x) + assert QQ.frac_field(x).get_exact() == QQ.frac_field(x) + assert RR.frac_field(x).get_exact() == QQ.frac_field(x) + assert CC.frac_field(x).get_exact() == QQ_I.frac_field(x) + assert ZZ.frac_field(x, y).get_exact() == ZZ.frac_field(x, y) + assert QQ.frac_field(x, y).get_exact() == QQ.frac_field(x, y) + assert RR.frac_field(x, y).get_exact() == QQ.frac_field(x, y) + assert CC.frac_field(x, y).get_exact() == QQ_I.frac_field(x, y) + assert ZZ.old_poly_ring(x).get_exact() == ZZ.old_poly_ring(x) + assert QQ.old_poly_ring(x).get_exact() == QQ.old_poly_ring(x) + assert RR.old_poly_ring(x).get_exact() == QQ.old_poly_ring(x) + assert CC.old_poly_ring(x).get_exact() == QQ_I.old_poly_ring(x) + assert ZZ.old_poly_ring(x, y).get_exact() == ZZ.old_poly_ring(x, y) + assert QQ.old_poly_ring(x, y).get_exact() == QQ.old_poly_ring(x, y) + assert RR.old_poly_ring(x, y).get_exact() == QQ.old_poly_ring(x, y) + assert CC.old_poly_ring(x, y).get_exact() == QQ_I.old_poly_ring(x, y) + assert ZZ.old_frac_field(x).get_exact() == ZZ.old_frac_field(x) + assert QQ.old_frac_field(x).get_exact() == QQ.old_frac_field(x) + assert RR.old_frac_field(x).get_exact() == QQ.old_frac_field(x) + assert CC.old_frac_field(x).get_exact() == QQ_I.old_frac_field(x) + assert ZZ.old_frac_field(x, y).get_exact() == ZZ.old_frac_field(x, y) + assert QQ.old_frac_field(x, y).get_exact() == QQ.old_frac_field(x, y) + assert RR.old_frac_field(x, y).get_exact() == QQ.old_frac_field(x, y) + assert CC.old_frac_field(x, y).get_exact() == QQ_I.old_frac_field(x, y) + + +def test_Domain_characteristic(): + for F, c in [(FF(3), 3), (FF(5), 5), (FF(7), 7)]: + for R in F, F[x], F.frac_field(x), F.old_poly_ring(x), F.old_frac_field(x): + assert R.has_CharacteristicZero is False + assert R.characteristic() == c + for D in ZZ, QQ, ZZ_I, QQ_I, ALG: + for R in D, D[x], D.frac_field(x), D.old_poly_ring(x), D.old_frac_field(x): + assert R.has_CharacteristicZero is True + assert R.characteristic() == 0 + + +def test_Domain_is_unit(): + nums = [-2, -1, 0, 1, 2] + invring = [False, True, False, True, False] + invfield = [True, True, False, True, True] + ZZx, QQx, QQxf = ZZ[x], QQ[x], QQ.frac_field(x) + assert [ZZ.is_unit(ZZ(n)) for n in nums] == invring + assert [QQ.is_unit(QQ(n)) for n in nums] == invfield + assert [ZZx.is_unit(ZZx(n)) for n in nums] == invring + assert [QQx.is_unit(QQx(n)) for n in nums] == invfield + assert [QQxf.is_unit(QQxf(n)) for n in nums] == invfield + assert ZZx.is_unit(ZZx(x)) is False + assert QQx.is_unit(QQx(x)) is False + assert QQxf.is_unit(QQxf(x)) is True + + +def test_Domain_convert(): + + def check_element(e1, e2, K1, K2, K3): + if isinstance(e1, PolyElement): + assert isinstance(e2, PolyElement) and e1.ring == e2.ring + elif isinstance(e1, FracElement): + assert isinstance(e2, FracElement) and e1.field == e2.field + else: + assert type(e1) is type(e2), '%s, %s: %s %s -> %s' % (e1, e2, K1, K2, K3) + assert e1 == e2, '%s, %s: %s %s -> %s' % (e1, e2, K1, K2, K3) + + def check_domains(K1, K2): + K3 = K1.unify(K2) + check_element(K3.convert_from(K1.one, K1), K3.one, K1, K2, K3) + check_element(K3.convert_from(K2.one, K2), K3.one, K1, K2, K3) + check_element(K3.convert_from(K1.zero, K1), K3.zero, K1, K2, K3) + check_element(K3.convert_from(K2.zero, K2), K3.zero, K1, K2, K3) + + def composite_domains(K): + domains = [ + K, + K[y], K[z], K[y, z], + K.frac_field(y), K.frac_field(z), K.frac_field(y, z), + # XXX: These should be tested and made to work... + # K.old_poly_ring(y), K.old_frac_field(y), + ] + return domains + + QQ2 = QQ.algebraic_field(sqrt(2)) + QQ3 = QQ.algebraic_field(sqrt(3)) + doms = [ZZ, QQ, QQ2, QQ3, QQ_I, ZZ_I, RR, CC] + + for i, K1 in enumerate(doms): + for K2 in doms[i:]: + for K3 in composite_domains(K1): + for K4 in composite_domains(K2): + check_domains(K3, K4) + + assert QQ.convert(10e-52) == QQ(1684996666696915, 1684996666696914987166688442938726917102321526408785780068975640576) + + R, xr = ring("x", ZZ) + assert ZZ.convert(xr - xr) == 0 + assert ZZ.convert(xr - xr, R.to_domain()) == 0 + + assert CC.convert(ZZ_I(1, 2)) == CC(1, 2) + assert CC.convert(QQ_I(1, 2)) == CC(1, 2) + + assert QQ.convert_from(RR(0.5), RR) == QQ(1, 2) + assert RR.convert_from(QQ(1, 2), QQ) == RR(0.5) + assert QQ_I.convert_from(CC(0.5, 0.75), CC) == QQ_I(QQ(1, 2), QQ(3, 4)) + assert CC.convert_from(QQ_I(QQ(1, 2), QQ(3, 4)), QQ_I) == CC(0.5, 0.75) + + K1 = QQ.frac_field(x) + K2 = ZZ.frac_field(x) + K3 = QQ[x] + K4 = ZZ[x] + Ks = [K1, K2, K3, K4] + for Ka, Kb in product(Ks, Ks): + assert Ka.convert_from(Kb.from_sympy(x), Kb) == Ka.from_sympy(x) + + assert K2.convert_from(QQ(1, 2), QQ) == K2(QQ(1, 2)) + + +def test_EX_convert(): + + elements = [ + (ZZ, ZZ(3)), + (QQ, QQ(1,2)), + (ZZ_I, ZZ_I(1,2)), + (QQ_I, QQ_I(1,2)), + (RR, RR(3)), + (CC, CC(1,2)), + (EX, EX(3)), + (EXRAW, EXRAW(3)), + (ALG, ALG.from_sympy(sqrt(2))), + ] + + for R, e in elements: + for EE in EX, EXRAW: + elem = EE.from_sympy(R.to_sympy(e)) + assert EE.convert_from(e, R) == elem + assert R.convert_from(elem, EE) == e + + +def test_GlobalPolynomialRing_convert(): + K1 = QQ.old_poly_ring(x) + K2 = QQ[x] + assert K1.convert(x) == K1.convert(K2.convert(x), K2) + assert K2.convert(x) == K2.convert(K1.convert(x), K1) + + K1 = QQ.old_poly_ring(x, y) + K2 = QQ[x] + assert K1.convert(x) == K1.convert(K2.convert(x), K2) + #assert K2.convert(x) == K2.convert(K1.convert(x), K1) + + K1 = ZZ.old_poly_ring(x, y) + K2 = QQ[x] + assert K1.convert(x) == K1.convert(K2.convert(x), K2) + #assert K2.convert(x) == K2.convert(K1.convert(x), K1) + + +def test_PolynomialRing__init(): + R, = ring("", ZZ) + assert ZZ.poly_ring() == R.to_domain() + + +def test_FractionField__init(): + F, = field("", ZZ) + assert ZZ.frac_field() == F.to_domain() + + +def test_FractionField_convert(): + K = QQ.frac_field(x) + assert K.convert(QQ(2, 3), QQ) == K.from_sympy(Rational(2, 3)) + K = QQ.frac_field(x) + assert K.convert(ZZ(2), ZZ) == K.from_sympy(Integer(2)) + + +def test_inject(): + assert ZZ.inject(x, y, z) == ZZ[x, y, z] + assert ZZ[x].inject(y, z) == ZZ[x, y, z] + assert ZZ.frac_field(x).inject(y, z) == ZZ.frac_field(x, y, z) + raises(GeneratorsError, lambda: ZZ[x].inject(x)) + + +def test_drop(): + assert ZZ.drop(x) == ZZ + assert ZZ[x].drop(x) == ZZ + assert ZZ[x, y].drop(x) == ZZ[y] + assert ZZ.frac_field(x).drop(x) == ZZ + assert ZZ.frac_field(x, y).drop(x) == ZZ.frac_field(y) + assert ZZ[x][y].drop(y) == ZZ[x] + assert ZZ[x][y].drop(x) == ZZ[y] + assert ZZ.frac_field(x)[y].drop(x) == ZZ[y] + assert ZZ.frac_field(x)[y].drop(y) == ZZ.frac_field(x) + Ky = FiniteExtension(Poly(x**2-1, x, domain=ZZ[y])) + K = FiniteExtension(Poly(x**2-1, x, domain=ZZ)) + assert Ky.drop(y) == K + raises(GeneratorsError, lambda: Ky.drop(x)) + + +def test_Domain_map(): + seq = ZZ.map([1, 2, 3, 4]) + + assert all(ZZ.of_type(elt) for elt in seq) + + seq = ZZ.map([[1, 2, 3, 4]]) + + assert all(ZZ.of_type(elt) for elt in seq[0]) and len(seq) == 1 + + +def test_Domain___eq__(): + assert (ZZ[x, y] == ZZ[x, y]) is True + assert (QQ[x, y] == QQ[x, y]) is True + + assert (ZZ[x, y] == QQ[x, y]) is False + assert (QQ[x, y] == ZZ[x, y]) is False + + assert (ZZ.frac_field(x, y) == ZZ.frac_field(x, y)) is True + assert (QQ.frac_field(x, y) == QQ.frac_field(x, y)) is True + + assert (ZZ.frac_field(x, y) == QQ.frac_field(x, y)) is False + assert (QQ.frac_field(x, y) == ZZ.frac_field(x, y)) is False + + assert RealField()[x] == RR[x] + + +def test_Domain__algebraic_field(): + alg = ZZ.algebraic_field(sqrt(2)) + assert alg.ext.minpoly == Poly(x**2 - 2) + assert alg.dom == QQ + + alg = QQ.algebraic_field(sqrt(2)) + assert alg.ext.minpoly == Poly(x**2 - 2) + assert alg.dom == QQ + + alg = alg.algebraic_field(sqrt(3)) + assert alg.ext.minpoly == Poly(x**4 - 10*x**2 + 1) + assert alg.dom == QQ + + +def test_Domain_alg_field_from_poly(): + f = Poly(x**2 - 2) + g = Poly(x**2 - 3) + h = Poly(x**4 - 10*x**2 + 1) + + alg = ZZ.alg_field_from_poly(f) + assert alg.ext.minpoly == f + assert alg.dom == QQ + + alg = QQ.alg_field_from_poly(f) + assert alg.ext.minpoly == f + assert alg.dom == QQ + + alg = alg.alg_field_from_poly(g) + assert alg.ext.minpoly == h + assert alg.dom == QQ + + +def test_Domain_cyclotomic_field(): + K = ZZ.cyclotomic_field(12) + assert K.ext.minpoly == Poly(cyclotomic_poly(12)) + assert K.dom == QQ + + F = QQ.cyclotomic_field(3) + assert F.ext.minpoly == Poly(cyclotomic_poly(3)) + assert F.dom == QQ + + E = F.cyclotomic_field(4) + assert field_isomorphism(E.ext, K.ext) is not None + assert E.dom == QQ + + +def test_PolynomialRing_from_FractionField(): + F, x,y = field("x,y", ZZ) + R, X,Y = ring("x,y", ZZ) + + f = (x**2 + y**2)/(x + 1) + g = (x**2 + y**2)/4 + h = x**2 + y**2 + + assert R.to_domain().from_FractionField(f, F.to_domain()) is None + assert R.to_domain().from_FractionField(g, F.to_domain()) == X**2/4 + Y**2/4 + assert R.to_domain().from_FractionField(h, F.to_domain()) == X**2 + Y**2 + + F, x,y = field("x,y", QQ) + R, X,Y = ring("x,y", QQ) + + f = (x**2 + y**2)/(x + 1) + g = (x**2 + y**2)/4 + h = x**2 + y**2 + + assert R.to_domain().from_FractionField(f, F.to_domain()) is None + assert R.to_domain().from_FractionField(g, F.to_domain()) == X**2/4 + Y**2/4 + assert R.to_domain().from_FractionField(h, F.to_domain()) == X**2 + Y**2 + + +def test_FractionField_from_PolynomialRing(): + R, x,y = ring("x,y", QQ) + F, X,Y = field("x,y", ZZ) + + f = 3*x**2 + 5*y**2 + g = x**2/3 + y**2/5 + + assert F.to_domain().from_PolynomialRing(f, R.to_domain()) == 3*X**2 + 5*Y**2 + assert F.to_domain().from_PolynomialRing(g, R.to_domain()) == (5*X**2 + 3*Y**2)/15 + + +def test_FF_of_type(): + # XXX: of_type is not very useful here because in the case of ground types + # = flint all elements are of type nmod. + assert FF(3).of_type(FF(3)(1)) is True + assert FF(5).of_type(FF(5)(3)) is True + + +def test___eq__(): + assert not QQ[x] == ZZ[x] + assert not QQ.frac_field(x) == ZZ.frac_field(x) + + +def test_RealField_from_sympy(): + assert RR.convert(S.Zero) == RR.dtype(0) + assert RR.convert(S(0.0)) == RR.dtype(0.0) + assert RR.convert(S.One) == RR.dtype(1) + assert RR.convert(S(1.0)) == RR.dtype(1.0) + assert RR.convert(sin(1)) == RR.dtype(sin(1).evalf()) + + +def test_not_in_any_domain(): + check = list(_illegal) + [x] + [ + float(i) for i in _illegal[:3]] + for dom in (ZZ, QQ, RR, CC, EX): + for i in check: + if i == x and dom == EX: + continue + assert i not in dom, (i, dom) + raises(CoercionFailed, lambda: dom.convert(i)) + + +def test_ModularInteger(): + F3 = FF(3) + + a = F3(0) + assert F3.of_type(a) and a == 0 + a = F3(1) + assert F3.of_type(a) and a == 1 + a = F3(2) + assert F3.of_type(a) and a == 2 + a = F3(3) + assert F3.of_type(a) and a == 0 + a = F3(4) + assert F3.of_type(a) and a == 1 + + a = F3(F3(0)) + assert F3.of_type(a) and a == 0 + a = F3(F3(1)) + assert F3.of_type(a) and a == 1 + a = F3(F3(2)) + assert F3.of_type(a) and a == 2 + a = F3(F3(3)) + assert F3.of_type(a) and a == 0 + a = F3(F3(4)) + assert F3.of_type(a) and a == 1 + + a = -F3(1) + assert F3.of_type(a) and a == 2 + a = -F3(2) + assert F3.of_type(a) and a == 1 + + a = 2 + F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2) + 2 + assert F3.of_type(a) and a == 1 + a = F3(2) + F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2) + F3(2) + assert F3.of_type(a) and a == 1 + + a = 3 - F3(2) + assert F3.of_type(a) and a == 1 + a = F3(3) - 2 + assert F3.of_type(a) and a == 1 + a = F3(3) - F3(2) + assert F3.of_type(a) and a == 1 + a = F3(3) - F3(2) + assert F3.of_type(a) and a == 1 + + a = 2*F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2)*2 + assert F3.of_type(a) and a == 1 + a = F3(2)*F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2)*F3(2) + assert F3.of_type(a) and a == 1 + + a = 2/F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2)/2 + assert F3.of_type(a) and a == 1 + a = F3(2)/F3(2) + assert F3.of_type(a) and a == 1 + a = F3(2)/F3(2) + assert F3.of_type(a) and a == 1 + + a = F3(2)**0 + assert F3.of_type(a) and a == 1 + a = F3(2)**1 + assert F3.of_type(a) and a == 2 + a = F3(2)**2 + assert F3.of_type(a) and a == 1 + + F7 = FF(7) + + a = F7(3)**100000000000 + assert F7.of_type(a) and a == 4 + a = F7(3)**-100000000000 + assert F7.of_type(a) and a == 2 + + assert bool(F3(3)) is False + assert bool(F3(4)) is True + + F5 = FF(5) + + a = F5(1)**(-1) + assert F5.of_type(a) and a == 1 + a = F5(2)**(-1) + assert F5.of_type(a) and a == 3 + a = F5(3)**(-1) + assert F5.of_type(a) and a == 2 + a = F5(4)**(-1) + assert F5.of_type(a) and a == 4 + + if GROUND_TYPES != 'flint': + # XXX: This gives a core dump with python-flint... + raises(NotInvertible, lambda: F5(0)**(-1)) + raises(NotInvertible, lambda: F5(5)**(-1)) + + raises(ValueError, lambda: FF(0)) + raises(ValueError, lambda: FF(2.1)) + + for n1 in range(5): + for n2 in range(5): + if GROUND_TYPES != 'flint': + with warns_deprecated_sympy(): + assert (F5(n1) < F5(n2)) is (n1 < n2) + with warns_deprecated_sympy(): + assert (F5(n1) <= F5(n2)) is (n1 <= n2) + with warns_deprecated_sympy(): + assert (F5(n1) > F5(n2)) is (n1 > n2) + with warns_deprecated_sympy(): + assert (F5(n1) >= F5(n2)) is (n1 >= n2) + else: + raises(TypeError, lambda: F5(n1) < F5(n2)) + raises(TypeError, lambda: F5(n1) <= F5(n2)) + raises(TypeError, lambda: F5(n1) > F5(n2)) + raises(TypeError, lambda: F5(n1) >= F5(n2)) + + # https://github.com/sympy/sympy/issues/26789 + assert GF(Integer(5)) == F5 + assert F5(Integer(3)) == F5(3) + + +def test_QQ_int(): + assert int(QQ(2**2000, 3**1250)) == 455431 + assert int(QQ(2**100, 3)) == 422550200076076467165567735125 + + +def test_RR_double(): + assert RR(3.14) > 1e-50 + assert RR(1e-13) > 1e-50 + assert RR(1e-14) > 1e-50 + assert RR(1e-15) > 1e-50 + assert RR(1e-20) > 1e-50 + assert RR(1e-40) > 1e-50 + + +def test_RR_Float(): + f1 = Float("1.01") + f2 = Float("1.0000000000000000000001") + assert f1._prec == 53 + assert f2._prec == 80 + assert RR(f1)-1 > 1e-50 + assert RR(f2)-1 < 1e-50 # RR's precision is lower than f2's + + RR2 = RealField(prec=f2._prec) + assert RR2(f1)-1 > 1e-50 + assert RR2(f2)-1 > 1e-50 # RR's precision is equal to f2's + + +def test_CC_double(): + assert CC(3.14).real > 1e-50 + assert CC(1e-13).real > 1e-50 + assert CC(1e-14).real > 1e-50 + assert CC(1e-15).real > 1e-50 + assert CC(1e-20).real > 1e-50 + assert CC(1e-40).real > 1e-50 + + assert CC(3.14j).imag > 1e-50 + assert CC(1e-13j).imag > 1e-50 + assert CC(1e-14j).imag > 1e-50 + assert CC(1e-15j).imag > 1e-50 + assert CC(1e-20j).imag > 1e-50 + assert CC(1e-40j).imag > 1e-50 + + +def test_gaussian_domains(): + I = S.ImaginaryUnit + a, b, c, d = [ZZ_I.convert(x) for x in (5, 2 + I, 3 - I, 5 - 5*I)] + assert ZZ_I.gcd(a, b) == b + assert ZZ_I.gcd(a, c) == b + assert ZZ_I.lcm(a, b) == a + assert ZZ_I.lcm(a, c) == d + assert ZZ_I(3, 4) != QQ_I(3, 4) # XXX is this right or should QQ->ZZ if possible? + assert ZZ_I(3, 0) != 3 # and should this go to Integer? + assert QQ_I(S(3)/4, 0) != S(3)/4 # and this to Rational? + assert ZZ_I(0, 0).quadrant() == 0 + assert ZZ_I(-1, 0).quadrant() == 2 + + assert QQ_I.convert(QQ(3, 2)) == QQ_I(QQ(3, 2), QQ(0)) + assert QQ_I.convert(QQ(3, 2), QQ) == QQ_I(QQ(3, 2), QQ(0)) + + for G in (QQ_I, ZZ_I): + + q = G(3, 4) + assert str(q) == '3 + 4*I' + assert q.parent() == G + assert q._get_xy(pi) == (None, None) + assert q._get_xy(2) == (2, 0) + assert q._get_xy(2*I) == (0, 2) + + assert hash(q) == hash((3, 4)) + assert G(1, 2) == G(1, 2) + assert G(1, 2) != G(1, 3) + assert G(3, 0) == G(3) + + assert q + q == G(6, 8) + assert q - q == G(0, 0) + assert 3 - q == -q + 3 == G(0, -4) + assert 3 + q == q + 3 == G(6, 4) + assert q * q == G(-7, 24) + assert 3 * q == q * 3 == G(9, 12) + assert q ** 0 == G(1, 0) + assert q ** 1 == q + assert q ** 2 == q * q == G(-7, 24) + assert q ** 3 == q * q * q == G(-117, 44) + assert 1 / q == q ** -1 == QQ_I(S(3)/25, - S(4)/25) + assert q / 1 == QQ_I(3, 4) + assert q / 2 == QQ_I(S(3)/2, 2) + assert q/3 == QQ_I(1, S(4)/3) + assert 3/q == QQ_I(S(9)/25, -S(12)/25) + i, r = divmod(q, 2) + assert 2*i + r == q + i, r = divmod(2, q) + assert q*i + r == G(2, 0) + + a, b = G(2, 0), G(1, -1) + c, d, g = G.gcdex(a, b) + assert g == G.gcd(a, b) + assert c * a + d * b == g + + raises(ZeroDivisionError, lambda: q % 0) + raises(ZeroDivisionError, lambda: q / 0) + raises(ZeroDivisionError, lambda: q // 0) + raises(ZeroDivisionError, lambda: divmod(q, 0)) + raises(ZeroDivisionError, lambda: divmod(q, 0)) + raises(TypeError, lambda: q + x) + raises(TypeError, lambda: q - x) + raises(TypeError, lambda: x + q) + raises(TypeError, lambda: x - q) + raises(TypeError, lambda: q * x) + raises(TypeError, lambda: x * q) + raises(TypeError, lambda: q / x) + raises(TypeError, lambda: x / q) + raises(TypeError, lambda: q // x) + raises(TypeError, lambda: x // q) + + assert G.from_sympy(S(2)) == G(2, 0) + assert G.to_sympy(G(2, 0)) == S(2) + raises(CoercionFailed, lambda: G.from_sympy(pi)) + + PR = G.inject(x) + assert isinstance(PR, PolynomialRing) + assert PR.domain == G + assert len(PR.gens) == 1 and PR.gens[0].as_expr() == x + + if G is QQ_I: + AF = G.as_AlgebraicField() + assert isinstance(AF, AlgebraicField) + assert AF.domain == QQ + assert AF.ext.args[0] == I + + for qi in [G(-1, 0), G(1, 0), G(0, -1), G(0, 1)]: + assert G.is_negative(qi) is False + assert G.is_positive(qi) is False + assert G.is_nonnegative(qi) is False + assert G.is_nonpositive(qi) is False + + domains = [ZZ, QQ, AlgebraicField(QQ, I)] + + # XXX: These domains are all obsolete because ZZ/QQ with MPZ/MPQ + # already use either gmpy, flint or python depending on the + # availability of these libraries. We can keep these tests for now but + # ideally we should remove these alternate domains entirely. + domains += [ZZ_python(), QQ_python()] + if GROUND_TYPES == 'gmpy': + domains += [ZZ_gmpy(), QQ_gmpy()] + + for K in domains: + assert G.convert(K(2)) == G(2, 0) + assert G.convert(K(2), K) == G(2, 0) + + for K in ZZ_I, QQ_I: + assert G.convert(K(1, 1)) == G(1, 1) + assert G.convert(K(1, 1), K) == G(1, 1) + + if G == ZZ_I: + assert repr(q) == 'ZZ_I(3, 4)' + assert q//3 == G(1, 1) + assert 12//q == G(1, -2) + assert 12 % q == G(1, 2) + assert q % 2 == G(-1, 0) + assert i == G(0, 0) + assert r == G(2, 0) + assert G.get_ring() == G + assert G.get_field() == QQ_I + else: + assert repr(q) == 'QQ_I(3, 4)' + assert G.get_ring() == ZZ_I + assert G.get_field() == G + assert q//3 == G(1, S(4)/3) + assert 12//q == G(S(36)/25, -S(48)/25) + assert 12 % q == G(0, 0) + assert q % 2 == G(0, 0) + assert i == G(S(6)/25, -S(8)/25), (G,i) + assert r == G(0, 0) + q2 = G(S(3)/2, S(5)/3) + assert G.numer(q2) == ZZ_I(9, 10) + assert G.denom(q2) == ZZ_I(6) + + +def test_EX_EXRAW(): + assert EXRAW.zero is S.Zero + assert EXRAW.one is S.One + + assert EX(1) == EX.Expression(1) + assert EX(1).ex is S.One + assert EXRAW(1) is S.One + + # EX has cancelling but EXRAW does not + assert 2*EX((x + y*x)/x) == EX(2 + 2*y) != 2*((x + y*x)/x) + assert 2*EXRAW((x + y*x)/x) == 2*((x + y*x)/x) != (1 + y) + + assert EXRAW.convert_from(EX(1), EX) is EXRAW.one + assert EX.convert_from(EXRAW(1), EXRAW) == EX.one + + assert EXRAW.from_sympy(S.One) is S.One + assert EXRAW.to_sympy(EXRAW.one) is S.One + raises(CoercionFailed, lambda: EXRAW.from_sympy([])) + + assert EXRAW.get_field() == EXRAW + + assert EXRAW.unify(EX) == EXRAW + assert EX.unify(EXRAW) == EXRAW + + +def test_EX_ordering(): + elements = [EX(1), EX(x), EX(3)] + assert sorted(elements) == [EX(1), EX(3), EX(x)] + + +def test_canonical_unit(): + + for K in [ZZ, QQ, RR]: # CC? + assert K.canonical_unit(K(2)) == K(1) + assert K.canonical_unit(K(-2)) == K(-1) + + for K in [ZZ_I, QQ_I]: + i = K.from_sympy(I) + assert K.canonical_unit(K(2)) == K(1) + assert K.canonical_unit(K(2)*i) == -i + assert K.canonical_unit(-K(2)) == K(-1) + assert K.canonical_unit(-K(2)*i) == i + + K = ZZ[x] + assert K.canonical_unit(K(x + 1)) == K(1) + assert K.canonical_unit(K(-x + 1)) == K(-1) + + K = ZZ_I[x] + assert K.canonical_unit(K.from_sympy(I*x)) == ZZ_I(0, -1) + + K = ZZ_I.frac_field(x, y) + i = K.from_sympy(I) + assert i / i == K.one + assert (K.one + i)/(i - K.one) == -i + + +def test_Domain_is_negative(): + I = S.ImaginaryUnit + a, b = [CC.convert(x) for x in (2 + I, 5)] + assert CC.is_negative(a) == False + assert CC.is_negative(b) == False + + +def test_Domain_is_positive(): + I = S.ImaginaryUnit + a, b = [CC.convert(x) for x in (2 + I, 5)] + assert CC.is_positive(a) == False + assert CC.is_positive(b) == False + + +def test_Domain_is_nonnegative(): + I = S.ImaginaryUnit + a, b = [CC.convert(x) for x in (2 + I, 5)] + assert CC.is_nonnegative(a) == False + assert CC.is_nonnegative(b) == False + + +def test_Domain_is_nonpositive(): + I = S.ImaginaryUnit + a, b = [CC.convert(x) for x in (2 + I, 5)] + assert CC.is_nonpositive(a) == False + assert CC.is_nonpositive(b) == False + + +def test_exponential_domain(): + K = ZZ[E] + eK = K.from_sympy(E) + assert K.from_sympy(exp(3)) == eK ** 3 + assert K.convert(exp(3)) == eK ** 3 + + +def test_AlgebraicField_alias(): + # No default alias: + k = QQ.algebraic_field(sqrt(2)) + assert k.ext.alias is None + + # For a single extension, its alias is used: + alpha = AlgebraicNumber(sqrt(2), alias='alpha') + k = QQ.algebraic_field(alpha) + assert k.ext.alias.name == 'alpha' + + # Can override the alias of a single extension: + k = QQ.algebraic_field(alpha, alias='theta') + assert k.ext.alias.name == 'theta' + + # With multiple extensions, no default alias: + k = QQ.algebraic_field(sqrt(2), sqrt(3)) + assert k.ext.alias is None + + # With multiple extensions, no default alias, even if one of + # the extensions has one: + k = QQ.algebraic_field(alpha, sqrt(3)) + assert k.ext.alias is None + + # With multiple extensions, may set an alias: + k = QQ.algebraic_field(sqrt(2), sqrt(3), alias='theta') + assert k.ext.alias.name == 'theta' + + # Alias is passed to constructed field elements: + k = QQ.algebraic_field(alpha) + beta = k.to_alg_num(k([1, 2, 3])) + assert beta.alias is alpha.alias + + +def test_exsqrt(): + assert ZZ.is_square(ZZ(4)) is True + assert ZZ.exsqrt(ZZ(4)) == ZZ(2) + assert ZZ.is_square(ZZ(42)) is False + assert ZZ.exsqrt(ZZ(42)) is None + assert ZZ.is_square(ZZ(0)) is True + assert ZZ.exsqrt(ZZ(0)) == ZZ(0) + assert ZZ.is_square(ZZ(-1)) is False + assert ZZ.exsqrt(ZZ(-1)) is None + + assert QQ.is_square(QQ(9, 4)) is True + assert QQ.exsqrt(QQ(9, 4)) == QQ(3, 2) + assert QQ.is_square(QQ(18, 8)) is True + assert QQ.exsqrt(QQ(18, 8)) == QQ(3, 2) + assert QQ.is_square(QQ(-9, -4)) is True + assert QQ.exsqrt(QQ(-9, -4)) == QQ(3, 2) + assert QQ.is_square(QQ(11, 4)) is False + assert QQ.exsqrt(QQ(11, 4)) is None + assert QQ.is_square(QQ(9, 5)) is False + assert QQ.exsqrt(QQ(9, 5)) is None + assert QQ.is_square(QQ(4)) is True + assert QQ.exsqrt(QQ(4)) == QQ(2) + assert QQ.is_square(QQ(0)) is True + assert QQ.exsqrt(QQ(0)) == QQ(0) + assert QQ.is_square(QQ(-16, 9)) is False + assert QQ.exsqrt(QQ(-16, 9)) is None + + assert RR.is_square(RR(6.25)) is True + assert RR.exsqrt(RR(6.25)) == RR(2.5) + assert RR.is_square(RR(2)) is True + assert RR.almosteq(RR.exsqrt(RR(2)), RR(1.4142135623730951), tolerance=1e-15) + assert RR.is_square(RR(0)) is True + assert RR.exsqrt(RR(0)) == RR(0) + assert RR.is_square(RR(-1)) is False + assert RR.exsqrt(RR(-1)) is None + + assert CC.is_square(CC(2)) is True + assert CC.almosteq(CC.exsqrt(CC(2)), CC(1.4142135623730951), tolerance=1e-15) + assert CC.is_square(CC(0)) is True + assert CC.exsqrt(CC(0)) == CC(0) + assert CC.is_square(CC(-1)) is True + assert CC.exsqrt(CC(-1)) == CC(0, 1) + assert CC.is_square(CC(0, 2)) is True + assert CC.exsqrt(CC(0, 2)) == CC(1, 1) + assert CC.is_square(CC(-3, -4)) is True + assert CC.exsqrt(CC(-3, -4)) == CC(1, -2) + + F2 = FF(2) + assert F2.is_square(F2(1)) is True + assert F2.exsqrt(F2(1)) == F2(1) + assert F2.is_square(F2(0)) is True + assert F2.exsqrt(F2(0)) == F2(0) + + F7 = FF(7) + assert F7.is_square(F7(2)) is True + assert F7.exsqrt(F7(2)) == F7(3) + assert F7.is_square(F7(3)) is False + assert F7.exsqrt(F7(3)) is None + assert F7.is_square(F7(0)) is True + assert F7.exsqrt(F7(0)) == F7(0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_polynomialring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_polynomialring.py new file mode 100644 index 0000000000000000000000000000000000000000..6cb1fdf3f9f9250518289019b0bb108047e8cb6c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_polynomialring.py @@ -0,0 +1,93 @@ +"""Tests for the PolynomialRing classes. """ + +from sympy.polys.domains import QQ, ZZ +from sympy.polys.polyerrors import ExactQuotientFailed, CoercionFailed, NotReversible + +from sympy.abc import x, y + +from sympy.testing.pytest import raises + + +def test_build_order(): + R = QQ.old_poly_ring(x, y, order=(("lex", x), ("ilex", y))) + assert R.order((1, 5)) == ((1,), (-5,)) + + +def test_globalring(): + Qxy = QQ.old_frac_field(x, y) + R = QQ.old_poly_ring(x, y) + X = R.convert(x) + Y = R.convert(y) + + assert x in R + assert 1/x not in R + assert 1/(1 + x) not in R + assert Y in R + assert X * (Y**2 + 1) == R.convert(x * (y**2 + 1)) + assert X + 1 == R.convert(x + 1) + raises(ExactQuotientFailed, lambda: X/Y) + raises(TypeError, lambda: x/Y) + raises(TypeError, lambda: X/y) + assert X**2 / X == X + + assert R.from_GlobalPolynomialRing(ZZ.old_poly_ring(x, y).convert(x), ZZ.old_poly_ring(x, y)) == X + assert R.from_FractionField(Qxy.convert(x), Qxy) == X + assert R.from_FractionField(Qxy.convert(x/y), Qxy) is None + + assert R._sdm_to_vector(R._vector_to_sdm([X, Y], R.order), 2) == [X, Y] + + +def test_localring(): + Qxy = QQ.old_frac_field(x, y) + R = QQ.old_poly_ring(x, y, order="ilex") + X = R.convert(x) + Y = R.convert(y) + + assert x in R + assert 1/x not in R + assert 1/(1 + x) in R + assert Y in R + assert X*(Y**2 + 1)/(1 + X) == R.convert(x*(y**2 + 1)/(1 + x)) + raises(TypeError, lambda: x/Y) + raises(TypeError, lambda: X/y) + assert X + 1 == R.convert(x + 1) + assert X**2 / X == X + + assert R.from_GlobalPolynomialRing(ZZ.old_poly_ring(x, y).convert(x), ZZ.old_poly_ring(x, y)) == X + assert R.from_FractionField(Qxy.convert(x), Qxy) == X + raises(CoercionFailed, lambda: R.from_FractionField(Qxy.convert(x/y), Qxy)) + raises(ExactQuotientFailed, lambda: R.exquo(X, Y)) + raises(NotReversible, lambda: R.revert(X)) + + assert R._sdm_to_vector( + R._vector_to_sdm([X/(X + 1), Y/(1 + X*Y)], R.order), 2) == \ + [X*(1 + X*Y), Y*(1 + X)] + + +def test_conversion(): + L = QQ.old_poly_ring(x, y, order="ilex") + G = QQ.old_poly_ring(x, y) + + assert L.convert(x) == L.convert(G.convert(x), G) + assert G.convert(x) == G.convert(L.convert(x), L) + raises(CoercionFailed, lambda: G.convert(L.convert(1/(1 + x)), L)) + + +def test_units(): + R = QQ.old_poly_ring(x) + assert R.is_unit(R.convert(1)) + assert R.is_unit(R.convert(2)) + assert not R.is_unit(R.convert(x)) + assert not R.is_unit(R.convert(1 + x)) + + R = QQ.old_poly_ring(x, order='ilex') + assert R.is_unit(R.convert(1)) + assert R.is_unit(R.convert(2)) + assert not R.is_unit(R.convert(x)) + assert R.is_unit(R.convert(1 + x)) + + R = ZZ.old_poly_ring(x) + assert R.is_unit(R.convert(1)) + assert not R.is_unit(R.convert(2)) + assert not R.is_unit(R.convert(x)) + assert not R.is_unit(R.convert(1 + x)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_quotientring.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_quotientring.py new file mode 100644 index 0000000000000000000000000000000000000000..aff167bdd72dc4400785efefef7b3e9057fd0727 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/domains/tests/test_quotientring.py @@ -0,0 +1,52 @@ +"""Tests for quotient rings.""" + +from sympy.polys.domains.integerring import ZZ +from sympy.polys.domains.rationalfield import QQ +from sympy.abc import x, y + +from sympy.polys.polyerrors import NotReversible + +from sympy.testing.pytest import raises + + +def test_QuotientRingElement(): + R = QQ.old_poly_ring(x)/[x**10] + X = R.convert(x) + + assert X*(X + 1) == R.convert(x**2 + x) + assert X*x == R.convert(x**2) + assert x*X == R.convert(x**2) + assert X + x == R.convert(2*x) + assert x + X == 2*X + assert X**2 == R.convert(x**2) + assert 1/(1 - X) == R.convert(sum(x**i for i in range(10))) + assert X**10 == R.zero + assert X != x + + raises(NotReversible, lambda: 1/X) + + +def test_QuotientRing(): + I = QQ.old_poly_ring(x).ideal(x**2 + 1) + R = QQ.old_poly_ring(x)/I + + assert R == QQ.old_poly_ring(x)/[x**2 + 1] + assert R == QQ.old_poly_ring(x)/QQ.old_poly_ring(x).ideal(x**2 + 1) + assert R != QQ.old_poly_ring(x) + + assert R.convert(1)/x == -x + I + assert -1 + I == x**2 + I + assert R.convert(ZZ(1), ZZ) == 1 + I + assert R.convert(R.convert(x), R) == R.convert(x) + + X = R.convert(x) + Y = QQ.old_poly_ring(x).convert(x) + assert -1 + I == X**2 + I + assert -1 + I == Y**2 + I + assert R.to_sympy(X) == x + + raises(ValueError, lambda: QQ.old_poly_ring(x)/QQ.old_poly_ring(x, y).ideal(x)) + + R = QQ.old_poly_ring(x, order="ilex") + I = R.ideal(x) + assert R.convert(1) + I == (R/I).convert(1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/euclidtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/euclidtools.py new file mode 100644 index 0000000000000000000000000000000000000000..768a44a94930f05e701e9f27a8b0f570a3312314 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/euclidtools.py @@ -0,0 +1,1912 @@ +"""Euclidean algorithms, GCDs, LCMs and polynomial remainder sequences. """ + + +from sympy.polys.densearith import ( + dup_sub_mul, + dup_neg, dmp_neg, + dmp_add, + dmp_sub, + dup_mul, dmp_mul, + dmp_pow, + dup_div, dmp_div, + dup_rem, + dup_quo, dmp_quo, + dup_prem, dmp_prem, + dup_mul_ground, dmp_mul_ground, + dmp_mul_term, + dup_quo_ground, dmp_quo_ground, + dup_max_norm, dmp_max_norm) +from sympy.polys.densebasic import ( + dup_strip, dmp_raise, + dmp_zero, dmp_one, dmp_ground, + dmp_one_p, dmp_zero_p, + dmp_zeros, + dup_degree, dmp_degree, dmp_degree_in, + dup_LC, dmp_LC, dmp_ground_LC, + dmp_multi_deflate, dmp_inflate, + dup_convert, dmp_convert, + dmp_apply_pairs) +from sympy.polys.densetools import ( + dup_clear_denoms, dmp_clear_denoms, + dup_diff, dmp_diff, + dup_eval, dmp_eval, dmp_eval_in, + dup_trunc, dmp_ground_trunc, + dup_monic, dmp_ground_monic, + dup_primitive, dmp_ground_primitive, + dup_extract, dmp_ground_extract) +from sympy.polys.galoistools import ( + gf_int, gf_crt) +from sympy.polys.polyconfig import query +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + HeuristicGCDFailed, + HomomorphismFailed, + NotInvertible, + DomainError) + + + + +def dup_half_gcdex(f, g, K): + """ + Half extended Euclidean algorithm in `F[x]`. + + Returns ``(s, h)`` such that ``h = gcd(f, g)`` and ``s*f = h (mod g)``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15 + >>> g = x**3 + x**2 - 4*x - 4 + + >>> R.dup_half_gcdex(f, g) + (-1/5*x + 3/5, x + 1) + + """ + if not K.is_Field: + raise DomainError("Cannot compute half extended GCD over %s" % K) + + a, b = [K.one], [] + + while g: + q, r = dup_div(f, g, K) + f, g = g, r + a, b = b, dup_sub_mul(a, q, b, K) + + a = dup_quo_ground(a, dup_LC(f, K), K) + f = dup_monic(f, K) + + return a, f + + +def dmp_half_gcdex(f, g, u, K): + """ + Half extended Euclidean algorithm in `F[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + """ + if not u: + return dup_half_gcdex(f, g, K) + else: + raise MultivariatePolynomialError(f, g) + + +def dup_gcdex(f, g, K): + """ + Extended Euclidean algorithm in `F[x]`. + + Returns ``(s, t, h)`` such that ``h = gcd(f, g)`` and ``s*f + t*g = h``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15 + >>> g = x**3 + x**2 - 4*x - 4 + + >>> R.dup_gcdex(f, g) + (-1/5*x + 3/5, 1/5*x**2 - 6/5*x + 2, x + 1) + + """ + s, h = dup_half_gcdex(f, g, K) + + F = dup_sub_mul(h, s, f, K) + t = dup_quo(F, g, K) + + return s, t, h + + +def dmp_gcdex(f, g, u, K): + """ + Extended Euclidean algorithm in `F[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + """ + if not u: + return dup_gcdex(f, g, K) + else: + raise MultivariatePolynomialError(f, g) + + +def dup_invert(f, g, K): + """ + Compute multiplicative inverse of `f` modulo `g` in `F[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = x**2 - 1 + >>> g = 2*x - 1 + >>> h = x - 1 + + >>> R.dup_invert(f, g) + -4/3 + + >>> R.dup_invert(f, h) + Traceback (most recent call last): + ... + NotInvertible: zero divisor + + """ + s, h = dup_half_gcdex(f, g, K) + + if h == [K.one]: + return dup_rem(s, g, K) + else: + raise NotInvertible("zero divisor") + + +def dmp_invert(f, g, u, K): + """ + Compute multiplicative inverse of `f` modulo `g` in `F[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + """ + if not u: + return dup_invert(f, g, K) + else: + raise MultivariatePolynomialError(f, g) + + +def dup_euclidean_prs(f, g, K): + """ + Euclidean polynomial remainder sequence (PRS) in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + >>> g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + >>> prs = R.dup_euclidean_prs(f, g) + + >>> prs[0] + x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + >>> prs[1] + 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + >>> prs[2] + -5/9*x**4 + 1/9*x**2 - 1/3 + >>> prs[3] + -117/25*x**2 - 9*x + 441/25 + >>> prs[4] + 233150/19773*x - 102500/6591 + >>> prs[5] + -1288744821/543589225 + + """ + prs = [f, g] + h = dup_rem(f, g, K) + + while h: + prs.append(h) + f, g = g, h + h = dup_rem(f, g, K) + + return prs + + +def dmp_euclidean_prs(f, g, u, K): + """ + Euclidean polynomial remainder sequence (PRS) in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + """ + if not u: + return dup_euclidean_prs(f, g, K) + else: + raise MultivariatePolynomialError(f, g) + + +def dup_primitive_prs(f, g, K): + """ + Primitive polynomial remainder sequence (PRS) in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + >>> g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + >>> prs = R.dup_primitive_prs(f, g) + + >>> prs[0] + x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + >>> prs[1] + 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + >>> prs[2] + -5*x**4 + x**2 - 3 + >>> prs[3] + 13*x**2 + 25*x - 49 + >>> prs[4] + 4663*x - 6150 + >>> prs[5] + 1 + + """ + prs = [f, g] + _, h = dup_primitive(dup_prem(f, g, K), K) + + while h: + prs.append(h) + f, g = g, h + _, h = dup_primitive(dup_prem(f, g, K), K) + + return prs + + +def dmp_primitive_prs(f, g, u, K): + """ + Primitive polynomial remainder sequence (PRS) in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + """ + if not u: + return dup_primitive_prs(f, g, K) + else: + raise MultivariatePolynomialError(f, g) + + +def dup_inner_subresultants(f, g, K): + """ + Subresultant PRS algorithm in `K[x]`. + + Computes the subresultant polynomial remainder sequence (PRS) + and the non-zero scalar subresultants of `f` and `g`. + By [1] Thm. 3, these are the constants '-c' (- to optimize + computation of sign). + The first subdeterminant is set to 1 by convention to match + the polynomial and the scalar subdeterminants. + If 'deg(f) < deg(g)', the subresultants of '(g,f)' are computed. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_inner_subresultants(x**2 + 1, x**2 - 1) + ([x**2 + 1, x**2 - 1, -2], [1, 1, 4]) + + References + ========== + + .. [1] W.S. Brown, The Subresultant PRS Algorithm. + ACM Transaction of Mathematical Software 4 (1978) 237-249 + + """ + n = dup_degree(f) + m = dup_degree(g) + + if n < m: + f, g = g, f + n, m = m, n + + if not f: + return [], [] + + if not g: + return [f], [K.one] + + R = [f, g] + d = n - m + + b = (-K.one)**(d + 1) + + h = dup_prem(f, g, K) + h = dup_mul_ground(h, b, K) + + lc = dup_LC(g, K) + c = lc**d + + # Conventional first scalar subdeterminant is 1 + S = [K.one, c] + c = -c + + while h: + k = dup_degree(h) + R.append(h) + + f, g, m, d = g, h, k, m - k + + b = -lc * c**d + + h = dup_prem(f, g, K) + h = dup_quo_ground(h, b, K) + + lc = dup_LC(g, K) + + if d > 1: # abnormal case + q = c**(d - 1) + c = K.quo((-lc)**d, q) + else: + c = -lc + + S.append(-c) + + return R, S + + +def dup_subresultants(f, g, K): + """ + Computes subresultant PRS of two polynomials in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_subresultants(x**2 + 1, x**2 - 1) + [x**2 + 1, x**2 - 1, -2] + + """ + return dup_inner_subresultants(f, g, K)[0] + + +def dup_prs_resultant(f, g, K): + """ + Resultant algorithm in `K[x]` using subresultant PRS. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_prs_resultant(x**2 + 1, x**2 - 1) + (4, [x**2 + 1, x**2 - 1, -2]) + + """ + if not f or not g: + return (K.zero, []) + + R, S = dup_inner_subresultants(f, g, K) + + if dup_degree(R[-1]) > 0: + return (K.zero, R) + + return S[-1], R + + +def dup_resultant(f, g, K, includePRS=False): + """ + Computes resultant of two polynomials in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_resultant(x**2 + 1, x**2 - 1) + 4 + + """ + if includePRS: + return dup_prs_resultant(f, g, K) + return dup_prs_resultant(f, g, K)[0] + + +def dmp_inner_subresultants(f, g, u, K): + """ + Subresultant PRS algorithm in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y - y**3 - 4 + >>> g = x**2 + x*y**3 - 9 + + >>> a = 3*x*y**4 + y**3 - 27*y + 4 + >>> b = -3*y**10 - 12*y**7 + y**6 - 54*y**4 + 8*y**3 + 729*y**2 - 216*y + 16 + + >>> prs = [f, g, a, b] + >>> sres = [[1], [1], [3, 0, 0, 0, 0], [-3, 0, 0, -12, 1, 0, -54, 8, 729, -216, 16]] + + >>> R.dmp_inner_subresultants(f, g) == (prs, sres) + True + + """ + if not u: + return dup_inner_subresultants(f, g, K) + + n = dmp_degree(f, u) + m = dmp_degree(g, u) + + if n < m: + f, g = g, f + n, m = m, n + + if dmp_zero_p(f, u): + return [], [] + + v = u - 1 + if dmp_zero_p(g, u): + return [f], [dmp_ground(K.one, v)] + + R = [f, g] + d = n - m + + b = dmp_pow(dmp_ground(-K.one, v), d + 1, v, K) + + h = dmp_prem(f, g, u, K) + h = dmp_mul_term(h, b, 0, u, K) + + lc = dmp_LC(g, K) + c = dmp_pow(lc, d, v, K) + + S = [dmp_ground(K.one, v), c] + c = dmp_neg(c, v, K) + + while not dmp_zero_p(h, u): + k = dmp_degree(h, u) + R.append(h) + + f, g, m, d = g, h, k, m - k + + b = dmp_mul(dmp_neg(lc, v, K), + dmp_pow(c, d, v, K), v, K) + + h = dmp_prem(f, g, u, K) + h = [ dmp_quo(ch, b, v, K) for ch in h ] + + lc = dmp_LC(g, K) + + if d > 1: + p = dmp_pow(dmp_neg(lc, v, K), d, v, K) + q = dmp_pow(c, d - 1, v, K) + c = dmp_quo(p, q, v, K) + else: + c = dmp_neg(lc, v, K) + + S.append(dmp_neg(c, v, K)) + + return R, S + + +def dmp_subresultants(f, g, u, K): + """ + Computes subresultant PRS of two polynomials in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y - y**3 - 4 + >>> g = x**2 + x*y**3 - 9 + + >>> a = 3*x*y**4 + y**3 - 27*y + 4 + >>> b = -3*y**10 - 12*y**7 + y**6 - 54*y**4 + 8*y**3 + 729*y**2 - 216*y + 16 + + >>> R.dmp_subresultants(f, g) == [f, g, a, b] + True + + """ + return dmp_inner_subresultants(f, g, u, K)[0] + + +def dmp_prs_resultant(f, g, u, K): + """ + Resultant algorithm in `K[X]` using subresultant PRS. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y - y**3 - 4 + >>> g = x**2 + x*y**3 - 9 + + >>> a = 3*x*y**4 + y**3 - 27*y + 4 + >>> b = -3*y**10 - 12*y**7 + y**6 - 54*y**4 + 8*y**3 + 729*y**2 - 216*y + 16 + + >>> res, prs = R.dmp_prs_resultant(f, g) + + >>> res == b # resultant has n-1 variables + False + >>> res == b.drop(x) + True + >>> prs == [f, g, a, b] + True + + """ + if not u: + return dup_prs_resultant(f, g, K) + + if dmp_zero_p(f, u) or dmp_zero_p(g, u): + return (dmp_zero(u - 1), []) + + R, S = dmp_inner_subresultants(f, g, u, K) + + if dmp_degree(R[-1], u) > 0: + return (dmp_zero(u - 1), R) + + return S[-1], R + + +def dmp_zz_modular_resultant(f, g, p, u, K): + """ + Compute resultant of `f` and `g` modulo a prime `p`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x + y + 2 + >>> g = 2*x*y + x + 3 + + >>> R.dmp_zz_modular_resultant(f, g, 5) + -2*y**2 + 1 + + """ + if not u: + return gf_int(dup_prs_resultant(f, g, K)[0] % p, p) + + v = u - 1 + + n = dmp_degree(f, u) + m = dmp_degree(g, u) + + N = dmp_degree_in(f, 1, u) + M = dmp_degree_in(g, 1, u) + + B = n*M + m*N + + D, a = [K.one], -K.one + r = dmp_zero(v) + + while dup_degree(D) <= B: + while True: + a += K.one + + if a == p: + raise HomomorphismFailed('no luck') + + F = dmp_eval_in(f, gf_int(a, p), 1, u, K) + + if dmp_degree(F, v) == n: + G = dmp_eval_in(g, gf_int(a, p), 1, u, K) + + if dmp_degree(G, v) == m: + break + + R = dmp_zz_modular_resultant(F, G, p, v, K) + e = dmp_eval(r, a, v, K) + + if not v: + R = dup_strip([R]) + e = dup_strip([e]) + else: + R = [R] + e = [e] + + d = K.invert(dup_eval(D, a, K), p) + d = dup_mul_ground(D, d, K) + d = dmp_raise(d, v, 0, K) + + c = dmp_mul(d, dmp_sub(R, e, v, K), v, K) + r = dmp_add(r, c, v, K) + + r = dmp_ground_trunc(r, p, v, K) + + D = dup_mul(D, [K.one, -a], K) + D = dup_trunc(D, p, K) + + return r + + +def _collins_crt(r, R, P, p, K): + """Wrapper of CRT for Collins's resultant algorithm. """ + return gf_int(gf_crt([r, R], [P, p], K), P*p) + + +def dmp_zz_collins_resultant(f, g, u, K): + """ + Collins's modular resultant algorithm in `Z[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x + y + 2 + >>> g = 2*x*y + x + 3 + + >>> R.dmp_zz_collins_resultant(f, g) + -2*y**2 - 5*y + 1 + + """ + + n = dmp_degree(f, u) + m = dmp_degree(g, u) + + if n < 0 or m < 0: + return dmp_zero(u - 1) + + A = dmp_max_norm(f, u, K) + B = dmp_max_norm(g, u, K) + + a = dmp_ground_LC(f, u, K) + b = dmp_ground_LC(g, u, K) + + v = u - 1 + + B = K(2)*K.factorial(K(n + m))*A**m*B**n + r, p, P = dmp_zero(v), K.one, K.one + + from sympy.ntheory import nextprime + + while P <= B: + p = K(nextprime(p)) + + while not (a % p) or not (b % p): + p = K(nextprime(p)) + + F = dmp_ground_trunc(f, p, u, K) + G = dmp_ground_trunc(g, p, u, K) + + try: + R = dmp_zz_modular_resultant(F, G, p, u, K) + except HomomorphismFailed: + continue + + if K.is_one(P): + r = R + else: + r = dmp_apply_pairs(r, R, _collins_crt, (P, p, K), v, K) + + P *= p + + return r + + +def dmp_qq_collins_resultant(f, g, u, K0): + """ + Collins's modular resultant algorithm in `Q[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y = ring("x,y", QQ) + + >>> f = QQ(1,2)*x + y + QQ(2,3) + >>> g = 2*x*y + x + 3 + + >>> R.dmp_qq_collins_resultant(f, g) + -2*y**2 - 7/3*y + 5/6 + + """ + n = dmp_degree(f, u) + m = dmp_degree(g, u) + + if n < 0 or m < 0: + return dmp_zero(u - 1) + + K1 = K0.get_ring() + + cf, f = dmp_clear_denoms(f, u, K0, K1) + cg, g = dmp_clear_denoms(g, u, K0, K1) + + f = dmp_convert(f, u, K0, K1) + g = dmp_convert(g, u, K0, K1) + + r = dmp_zz_collins_resultant(f, g, u, K1) + r = dmp_convert(r, u - 1, K1, K0) + + c = K0.convert(cf**m * cg**n, K1) + + return dmp_quo_ground(r, c, u - 1, K0) + + +def dmp_resultant(f, g, u, K, includePRS=False): + """ + Computes resultant of two polynomials in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = 3*x**2*y - y**3 - 4 + >>> g = x**2 + x*y**3 - 9 + + >>> R.dmp_resultant(f, g) + -3*y**10 - 12*y**7 + y**6 - 54*y**4 + 8*y**3 + 729*y**2 - 216*y + 16 + + """ + if not u: + return dup_resultant(f, g, K, includePRS=includePRS) + + if includePRS: + return dmp_prs_resultant(f, g, u, K) + + if K.is_Field: + if K.is_QQ and query('USE_COLLINS_RESULTANT'): + return dmp_qq_collins_resultant(f, g, u, K) + else: + if K.is_ZZ and query('USE_COLLINS_RESULTANT'): + return dmp_zz_collins_resultant(f, g, u, K) + + return dmp_prs_resultant(f, g, u, K)[0] + + +def dup_discriminant(f, K): + """ + Computes discriminant of a polynomial in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_discriminant(x**2 + 2*x + 3) + -8 + + """ + d = dup_degree(f) + + if d <= 0: + return K.zero + else: + s = (-1)**((d*(d - 1)) // 2) + c = dup_LC(f, K) + + r = dup_resultant(f, dup_diff(f, 1, K), K) + + return K.quo(r, c*K(s)) + + +def dmp_discriminant(f, u, K): + """ + Computes discriminant of a polynomial in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y,z,t = ring("x,y,z,t", ZZ) + + >>> R.dmp_discriminant(x**2*y + x*z + t) + -4*y*t + z**2 + + """ + if not u: + return dup_discriminant(f, K) + + d, v = dmp_degree(f, u), u - 1 + + if d <= 0: + return dmp_zero(v) + else: + s = (-1)**((d*(d - 1)) // 2) + c = dmp_LC(f, K) + + r = dmp_resultant(f, dmp_diff(f, 1, u, K), u, K) + c = dmp_mul_ground(c, K(s), v, K) + + return dmp_quo(r, c, v, K) + + +def _dup_rr_trivial_gcd(f, g, K): + """Handle trivial cases in GCD algorithm over a ring. """ + if not (f or g): + return [], [], [] + elif not f: + if K.is_nonnegative(dup_LC(g, K)): + return g, [], [K.one] + else: + return dup_neg(g, K), [], [-K.one] + elif not g: + if K.is_nonnegative(dup_LC(f, K)): + return f, [K.one], [] + else: + return dup_neg(f, K), [-K.one], [] + + return None + + +def _dup_ff_trivial_gcd(f, g, K): + """Handle trivial cases in GCD algorithm over a field. """ + if not (f or g): + return [], [], [] + elif not f: + return dup_monic(g, K), [], [dup_LC(g, K)] + elif not g: + return dup_monic(f, K), [dup_LC(f, K)], [] + else: + return None + + +def _dmp_rr_trivial_gcd(f, g, u, K): + """Handle trivial cases in GCD algorithm over a ring. """ + zero_f = dmp_zero_p(f, u) + zero_g = dmp_zero_p(g, u) + if_contain_one = dmp_one_p(f, u, K) or dmp_one_p(g, u, K) + + if zero_f and zero_g: + return tuple(dmp_zeros(3, u, K)) + elif zero_f: + if K.is_nonnegative(dmp_ground_LC(g, u, K)): + return g, dmp_zero(u), dmp_one(u, K) + else: + return dmp_neg(g, u, K), dmp_zero(u), dmp_ground(-K.one, u) + elif zero_g: + if K.is_nonnegative(dmp_ground_LC(f, u, K)): + return f, dmp_one(u, K), dmp_zero(u) + else: + return dmp_neg(f, u, K), dmp_ground(-K.one, u), dmp_zero(u) + elif if_contain_one: + return dmp_one(u, K), f, g + elif query('USE_SIMPLIFY_GCD'): + return _dmp_simplify_gcd(f, g, u, K) + else: + return None + + +def _dmp_ff_trivial_gcd(f, g, u, K): + """Handle trivial cases in GCD algorithm over a field. """ + zero_f = dmp_zero_p(f, u) + zero_g = dmp_zero_p(g, u) + + if zero_f and zero_g: + return tuple(dmp_zeros(3, u, K)) + elif zero_f: + return (dmp_ground_monic(g, u, K), + dmp_zero(u), + dmp_ground(dmp_ground_LC(g, u, K), u)) + elif zero_g: + return (dmp_ground_monic(f, u, K), + dmp_ground(dmp_ground_LC(f, u, K), u), + dmp_zero(u)) + elif query('USE_SIMPLIFY_GCD'): + return _dmp_simplify_gcd(f, g, u, K) + else: + return None + + +def _dmp_simplify_gcd(f, g, u, K): + """Try to eliminate `x_0` from GCD computation in `K[X]`. """ + df = dmp_degree(f, u) + dg = dmp_degree(g, u) + + if df > 0 and dg > 0: + return None + + if not (df or dg): + F = dmp_LC(f, K) + G = dmp_LC(g, K) + else: + if not df: + F = dmp_LC(f, K) + G = dmp_content(g, u, K) + else: + F = dmp_content(f, u, K) + G = dmp_LC(g, K) + + v = u - 1 + h = dmp_gcd(F, G, v, K) + + cff = [ dmp_quo(cf, h, v, K) for cf in f ] + cfg = [ dmp_quo(cg, h, v, K) for cg in g ] + + return [h], cff, cfg + + +def dup_rr_prs_gcd(f, g, K): + """ + Computes polynomial GCD using subresultants over a ring. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, ``cff = quo(f, h)``, + and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_rr_prs_gcd(x**2 - 1, x**2 - 3*x + 2) + (x - 1, x + 1, x - 2) + + """ + result = _dup_rr_trivial_gcd(f, g, K) + + if result is not None: + return result + + fc, F = dup_primitive(f, K) + gc, G = dup_primitive(g, K) + + c = K.gcd(fc, gc) + + h = dup_subresultants(F, G, K)[-1] + _, h = dup_primitive(h, K) + + c *= K.canonical_unit(dup_LC(h, K)) + + h = dup_mul_ground(h, c, K) + + cff = dup_quo(f, h, K) + cfg = dup_quo(g, h, K) + + return h, cff, cfg + + +def dup_ff_prs_gcd(f, g, K): + """ + Computes polynomial GCD using subresultants over a field. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, ``cff = quo(f, h)``, + and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> R.dup_ff_prs_gcd(x**2 - 1, x**2 - 3*x + 2) + (x - 1, x + 1, x - 2) + + """ + result = _dup_ff_trivial_gcd(f, g, K) + + if result is not None: + return result + + h = dup_subresultants(f, g, K)[-1] + h = dup_monic(h, K) + + cff = dup_quo(f, h, K) + cfg = dup_quo(g, h, K) + + return h, cff, cfg + + +def dmp_rr_prs_gcd(f, g, u, K): + """ + Computes polynomial GCD using subresultants over a ring. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, ``cff = quo(f, h)``, + and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_rr_prs_gcd(f, g) + (x + y, x + y, x) + + """ + if not u: + return dup_rr_prs_gcd(f, g, K) + + result = _dmp_rr_trivial_gcd(f, g, u, K) + + if result is not None: + return result + + fc, F = dmp_primitive(f, u, K) + gc, G = dmp_primitive(g, u, K) + + h = dmp_subresultants(F, G, u, K)[-1] + c, _, _ = dmp_rr_prs_gcd(fc, gc, u - 1, K) + + _, h = dmp_primitive(h, u, K) + h = dmp_mul_term(h, c, 0, u, K) + + unit = K.canonical_unit(dmp_ground_LC(h, u, K)) + + if unit != K.one: + h = dmp_mul_ground(h, unit, u, K) + + cff = dmp_quo(f, h, u, K) + cfg = dmp_quo(g, h, u, K) + + return h, cff, cfg + + +def dmp_ff_prs_gcd(f, g, u, K): + """ + Computes polynomial GCD using subresultants over a field. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, ``cff = quo(f, h)``, + and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y, = ring("x,y", QQ) + + >>> f = QQ(1,2)*x**2 + x*y + QQ(1,2)*y**2 + >>> g = x**2 + x*y + + >>> R.dmp_ff_prs_gcd(f, g) + (x + y, 1/2*x + 1/2*y, x) + + """ + if not u: + return dup_ff_prs_gcd(f, g, K) + + result = _dmp_ff_trivial_gcd(f, g, u, K) + + if result is not None: + return result + + fc, F = dmp_primitive(f, u, K) + gc, G = dmp_primitive(g, u, K) + + h = dmp_subresultants(F, G, u, K)[-1] + c, _, _ = dmp_ff_prs_gcd(fc, gc, u - 1, K) + + _, h = dmp_primitive(h, u, K) + h = dmp_mul_term(h, c, 0, u, K) + h = dmp_ground_monic(h, u, K) + + cff = dmp_quo(f, h, u, K) + cfg = dmp_quo(g, h, u, K) + + return h, cff, cfg + +HEU_GCD_MAX = 6 + + +def _dup_zz_gcd_interpolate(h, x, K): + """Interpolate polynomial GCD from integer GCD. """ + f = [] + + while h: + g = h % x + + if g > x // 2: + g -= x + + f.insert(0, g) + h = (h - g) // x + + return f + + +def dup_zz_heu_gcd(f, g, K): + """ + Heuristic polynomial GCD in `Z[x]`. + + Given univariate polynomials `f` and `g` in `Z[x]`, returns + their GCD and cofactors, i.e. polynomials ``h``, ``cff`` and ``cfg`` + such that:: + + h = gcd(f, g), cff = quo(f, h) and cfg = quo(g, h) + + The algorithm is purely heuristic which means it may fail to compute + the GCD. This will be signaled by raising an exception. In this case + you will need to switch to another GCD method. + + The algorithm computes the polynomial GCD by evaluating polynomials + f and g at certain points and computing (fast) integer GCD of those + evaluations. The polynomial GCD is recovered from the integer image + by interpolation. The final step is to verify if the result is the + correct GCD. This gives cofactors as a side effect. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_zz_heu_gcd(x**2 - 1, x**2 - 3*x + 2) + (x - 1, x + 1, x - 2) + + References + ========== + + .. [1] [Liao95]_ + + """ + result = _dup_rr_trivial_gcd(f, g, K) + + if result is not None: + return result + + df = dup_degree(f) + dg = dup_degree(g) + + gcd, f, g = dup_extract(f, g, K) + + if df == 0 or dg == 0: + return [gcd], f, g + + f_norm = dup_max_norm(f, K) + g_norm = dup_max_norm(g, K) + + B = K(2*min(f_norm, g_norm) + 29) + + x = max(min(B, 99*K.sqrt(B)), + 2*min(f_norm // abs(dup_LC(f, K)), + g_norm // abs(dup_LC(g, K))) + 4) + + for i in range(0, HEU_GCD_MAX): + ff = dup_eval(f, x, K) + gg = dup_eval(g, x, K) + + if ff and gg: + h = K.gcd(ff, gg) + + cff = ff // h + cfg = gg // h + + h = _dup_zz_gcd_interpolate(h, x, K) + h = dup_primitive(h, K)[1] + + cff_, r = dup_div(f, h, K) + + if not r: + cfg_, r = dup_div(g, h, K) + + if not r: + h = dup_mul_ground(h, gcd, K) + return h, cff_, cfg_ + + cff = _dup_zz_gcd_interpolate(cff, x, K) + + h, r = dup_div(f, cff, K) + + if not r: + cfg_, r = dup_div(g, h, K) + + if not r: + h = dup_mul_ground(h, gcd, K) + return h, cff, cfg_ + + cfg = _dup_zz_gcd_interpolate(cfg, x, K) + + h, r = dup_div(g, cfg, K) + + if not r: + cff_, r = dup_div(f, h, K) + + if not r: + h = dup_mul_ground(h, gcd, K) + return h, cff_, cfg + + x = 73794*x * K.sqrt(K.sqrt(x)) // 27011 + + raise HeuristicGCDFailed('no luck') + + +def _dmp_zz_gcd_interpolate(h, x, v, K): + """Interpolate polynomial GCD from integer GCD. """ + f = [] + + while not dmp_zero_p(h, v): + g = dmp_ground_trunc(h, x, v, K) + f.insert(0, g) + + h = dmp_sub(h, g, v, K) + h = dmp_quo_ground(h, x, v, K) + + if K.is_negative(dmp_ground_LC(f, v + 1, K)): + return dmp_neg(f, v + 1, K) + else: + return f + + +def dmp_zz_heu_gcd(f, g, u, K): + """ + Heuristic polynomial GCD in `Z[X]`. + + Given univariate polynomials `f` and `g` in `Z[X]`, returns + their GCD and cofactors, i.e. polynomials ``h``, ``cff`` and ``cfg`` + such that:: + + h = gcd(f, g), cff = quo(f, h) and cfg = quo(g, h) + + The algorithm is purely heuristic which means it may fail to compute + the GCD. This will be signaled by raising an exception. In this case + you will need to switch to another GCD method. + + The algorithm computes the polynomial GCD by evaluating polynomials + f and g at certain points and computing (fast) integer GCD of those + evaluations. The polynomial GCD is recovered from the integer image + by interpolation. The evaluation process reduces f and g variable by + variable into a large integer. The final step is to verify if the + interpolated polynomial is the correct GCD. This gives cofactors of + the input polynomials as a side effect. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_zz_heu_gcd(f, g) + (x + y, x + y, x) + + References + ========== + + .. [1] [Liao95]_ + + """ + if not u: + return dup_zz_heu_gcd(f, g, K) + + result = _dmp_rr_trivial_gcd(f, g, u, K) + + if result is not None: + return result + + gcd, f, g = dmp_ground_extract(f, g, u, K) + + f_norm = dmp_max_norm(f, u, K) + g_norm = dmp_max_norm(g, u, K) + + B = K(2*min(f_norm, g_norm) + 29) + + x = max(min(B, 99*K.sqrt(B)), + 2*min(f_norm // abs(dmp_ground_LC(f, u, K)), + g_norm // abs(dmp_ground_LC(g, u, K))) + 4) + + for i in range(0, HEU_GCD_MAX): + ff = dmp_eval(f, x, u, K) + gg = dmp_eval(g, x, u, K) + + v = u - 1 + + if not (dmp_zero_p(ff, v) or dmp_zero_p(gg, v)): + h, cff, cfg = dmp_zz_heu_gcd(ff, gg, v, K) + + h = _dmp_zz_gcd_interpolate(h, x, v, K) + h = dmp_ground_primitive(h, u, K)[1] + + cff_, r = dmp_div(f, h, u, K) + + if dmp_zero_p(r, u): + cfg_, r = dmp_div(g, h, u, K) + + if dmp_zero_p(r, u): + h = dmp_mul_ground(h, gcd, u, K) + return h, cff_, cfg_ + + cff = _dmp_zz_gcd_interpolate(cff, x, v, K) + + h, r = dmp_div(f, cff, u, K) + + if dmp_zero_p(r, u): + cfg_, r = dmp_div(g, h, u, K) + + if dmp_zero_p(r, u): + h = dmp_mul_ground(h, gcd, u, K) + return h, cff, cfg_ + + cfg = _dmp_zz_gcd_interpolate(cfg, x, v, K) + + h, r = dmp_div(g, cfg, u, K) + + if dmp_zero_p(r, u): + cff_, r = dmp_div(f, h, u, K) + + if dmp_zero_p(r, u): + h = dmp_mul_ground(h, gcd, u, K) + return h, cff_, cfg + + x = 73794*x * K.sqrt(K.sqrt(x)) // 27011 + + raise HeuristicGCDFailed('no luck') + + +def dup_qq_heu_gcd(f, g, K0): + """ + Heuristic polynomial GCD in `Q[x]`. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, + ``cff = quo(f, h)``, and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = QQ(1,2)*x**2 + QQ(7,4)*x + QQ(3,2) + >>> g = QQ(1,2)*x**2 + x + + >>> R.dup_qq_heu_gcd(f, g) + (x + 2, 1/2*x + 3/4, 1/2*x) + + """ + result = _dup_ff_trivial_gcd(f, g, K0) + + if result is not None: + return result + + K1 = K0.get_ring() + + cf, f = dup_clear_denoms(f, K0, K1) + cg, g = dup_clear_denoms(g, K0, K1) + + f = dup_convert(f, K0, K1) + g = dup_convert(g, K0, K1) + + h, cff, cfg = dup_zz_heu_gcd(f, g, K1) + + h = dup_convert(h, K1, K0) + + c = dup_LC(h, K0) + h = dup_monic(h, K0) + + cff = dup_convert(cff, K1, K0) + cfg = dup_convert(cfg, K1, K0) + + cff = dup_mul_ground(cff, K0.quo(c, cf), K0) + cfg = dup_mul_ground(cfg, K0.quo(c, cg), K0) + + return h, cff, cfg + + +def dmp_qq_heu_gcd(f, g, u, K0): + """ + Heuristic polynomial GCD in `Q[X]`. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, + ``cff = quo(f, h)``, and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y, = ring("x,y", QQ) + + >>> f = QQ(1,4)*x**2 + x*y + y**2 + >>> g = QQ(1,2)*x**2 + x*y + + >>> R.dmp_qq_heu_gcd(f, g) + (x + 2*y, 1/4*x + 1/2*y, 1/2*x) + + """ + result = _dmp_ff_trivial_gcd(f, g, u, K0) + + if result is not None: + return result + + K1 = K0.get_ring() + + cf, f = dmp_clear_denoms(f, u, K0, K1) + cg, g = dmp_clear_denoms(g, u, K0, K1) + + f = dmp_convert(f, u, K0, K1) + g = dmp_convert(g, u, K0, K1) + + h, cff, cfg = dmp_zz_heu_gcd(f, g, u, K1) + + h = dmp_convert(h, u, K1, K0) + + c = dmp_ground_LC(h, u, K0) + h = dmp_ground_monic(h, u, K0) + + cff = dmp_convert(cff, u, K1, K0) + cfg = dmp_convert(cfg, u, K1, K0) + + cff = dmp_mul_ground(cff, K0.quo(c, cf), u, K0) + cfg = dmp_mul_ground(cfg, K0.quo(c, cg), u, K0) + + return h, cff, cfg + + +def dup_inner_gcd(f, g, K): + """ + Computes polynomial GCD and cofactors of `f` and `g` in `K[x]`. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, + ``cff = quo(f, h)``, and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_inner_gcd(x**2 - 1, x**2 - 3*x + 2) + (x - 1, x + 1, x - 2) + + """ + # XXX: This used to check for K.is_Exact but leads to awkward results when + # the domain is something like RR[z] e.g.: + # + # >>> g, p, q = Poly(1, x).cancel(Poly(51.05*x*y - 1.0, x)) + # >>> g + # 1.0 + # >>> p + # Poly(17592186044421.0, x, domain='RR[y]') + # >>> q + # Poly(898081097567692.0*y*x - 17592186044421.0, x, domain='RR[y]')) + # + # Maybe it would be better to flatten into multivariate polynomials first. + if K.is_RR or K.is_CC: + try: + exact = K.get_exact() + except DomainError: + return [K.one], f, g + + f = dup_convert(f, K, exact) + g = dup_convert(g, K, exact) + + h, cff, cfg = dup_inner_gcd(f, g, exact) + + h = dup_convert(h, exact, K) + cff = dup_convert(cff, exact, K) + cfg = dup_convert(cfg, exact, K) + + return h, cff, cfg + elif K.is_Field: + if K.is_QQ and query('USE_HEU_GCD'): + try: + return dup_qq_heu_gcd(f, g, K) + except HeuristicGCDFailed: + pass + + return dup_ff_prs_gcd(f, g, K) + else: + if K.is_ZZ and query('USE_HEU_GCD'): + try: + return dup_zz_heu_gcd(f, g, K) + except HeuristicGCDFailed: + pass + + return dup_rr_prs_gcd(f, g, K) + + +def _dmp_inner_gcd(f, g, u, K): + """Helper function for `dmp_inner_gcd()`. """ + if not K.is_Exact: + try: + exact = K.get_exact() + except DomainError: + return dmp_one(u, K), f, g + + f = dmp_convert(f, u, K, exact) + g = dmp_convert(g, u, K, exact) + + h, cff, cfg = _dmp_inner_gcd(f, g, u, exact) + + h = dmp_convert(h, u, exact, K) + cff = dmp_convert(cff, u, exact, K) + cfg = dmp_convert(cfg, u, exact, K) + + return h, cff, cfg + elif K.is_Field: + if K.is_QQ and query('USE_HEU_GCD'): + try: + return dmp_qq_heu_gcd(f, g, u, K) + except HeuristicGCDFailed: + pass + + return dmp_ff_prs_gcd(f, g, u, K) + else: + if K.is_ZZ and query('USE_HEU_GCD'): + try: + return dmp_zz_heu_gcd(f, g, u, K) + except HeuristicGCDFailed: + pass + + return dmp_rr_prs_gcd(f, g, u, K) + + +def dmp_inner_gcd(f, g, u, K): + """ + Computes polynomial GCD and cofactors of `f` and `g` in `K[X]`. + + Returns ``(h, cff, cfg)`` such that ``a = gcd(f, g)``, + ``cff = quo(f, h)``, and ``cfg = quo(g, h)``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_inner_gcd(f, g) + (x + y, x + y, x) + + """ + if not u: + return dup_inner_gcd(f, g, K) + + J, (f, g) = dmp_multi_deflate((f, g), u, K) + h, cff, cfg = _dmp_inner_gcd(f, g, u, K) + + return (dmp_inflate(h, J, u, K), + dmp_inflate(cff, J, u, K), + dmp_inflate(cfg, J, u, K)) + + +def dup_gcd(f, g, K): + """ + Computes polynomial GCD of `f` and `g` in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_gcd(x**2 - 1, x**2 - 3*x + 2) + x - 1 + + """ + return dup_inner_gcd(f, g, K)[0] + + +def dmp_gcd(f, g, u, K): + """ + Computes polynomial GCD of `f` and `g` in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_gcd(f, g) + x + y + + """ + return dmp_inner_gcd(f, g, u, K)[0] + + +def dup_rr_lcm(f, g, K): + """ + Computes polynomial LCM over a ring in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_rr_lcm(x**2 - 1, x**2 - 3*x + 2) + x**3 - 2*x**2 - x + 2 + + """ + if not f or not g: + return dmp_zero(0) + + fc, f = dup_primitive(f, K) + gc, g = dup_primitive(g, K) + + c = K.lcm(fc, gc) + + h = dup_quo(dup_mul(f, g, K), + dup_gcd(f, g, K), K) + + u = K.canonical_unit(dup_LC(h, K)) + + return dup_mul_ground(h, c*u, K) + + +def dup_ff_lcm(f, g, K): + """ + Computes polynomial LCM over a field in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> f = QQ(1,2)*x**2 + QQ(7,4)*x + QQ(3,2) + >>> g = QQ(1,2)*x**2 + x + + >>> R.dup_ff_lcm(f, g) + x**3 + 7/2*x**2 + 3*x + + """ + h = dup_quo(dup_mul(f, g, K), + dup_gcd(f, g, K), K) + + return dup_monic(h, K) + + +def dup_lcm(f, g, K): + """ + Computes polynomial LCM of `f` and `g` in `K[x]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_lcm(x**2 - 1, x**2 - 3*x + 2) + x**3 - 2*x**2 - x + 2 + + """ + if K.is_Field: + return dup_ff_lcm(f, g, K) + else: + return dup_rr_lcm(f, g, K) + + +def dmp_rr_lcm(f, g, u, K): + """ + Computes polynomial LCM over a ring in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_rr_lcm(f, g) + x**3 + 2*x**2*y + x*y**2 + + """ + fc, f = dmp_ground_primitive(f, u, K) + gc, g = dmp_ground_primitive(g, u, K) + + c = K.lcm(fc, gc) + + h = dmp_quo(dmp_mul(f, g, u, K), + dmp_gcd(f, g, u, K), u, K) + + return dmp_mul_ground(h, c, u, K) + + +def dmp_ff_lcm(f, g, u, K): + """ + Computes polynomial LCM over a field in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x,y, = ring("x,y", QQ) + + >>> f = QQ(1,4)*x**2 + x*y + y**2 + >>> g = QQ(1,2)*x**2 + x*y + + >>> R.dmp_ff_lcm(f, g) + x**3 + 4*x**2*y + 4*x*y**2 + + """ + h = dmp_quo(dmp_mul(f, g, u, K), + dmp_gcd(f, g, u, K), u, K) + + return dmp_ground_monic(h, u, K) + + +def dmp_lcm(f, g, u, K): + """ + Computes polynomial LCM of `f` and `g` in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> R.dmp_lcm(f, g) + x**3 + 2*x**2*y + x*y**2 + + """ + if not u: + return dup_lcm(f, g, K) + + if K.is_Field: + return dmp_ff_lcm(f, g, u, K) + else: + return dmp_rr_lcm(f, g, u, K) + + +def dmp_content(f, u, K): + """ + Returns GCD of multivariate coefficients. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> R.dmp_content(2*x*y + 6*x + 4*y + 12) + 2*y + 6 + + """ + cont, v = dmp_LC(f, K), u - 1 + + if dmp_zero_p(f, u): + return cont + + for c in f[1:]: + cont = dmp_gcd(cont, c, v, K) + + if dmp_one_p(cont, v, K): + break + + if K.is_negative(dmp_ground_LC(cont, v, K)): + return dmp_neg(cont, v, K) + else: + return cont + + +def dmp_primitive(f, u, K): + """ + Returns multivariate content and a primitive polynomial. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y, = ring("x,y", ZZ) + + >>> R.dmp_primitive(2*x*y + 6*x + 4*y + 12) + (2*y + 6, x + 2) + + """ + cont, v = dmp_content(f, u, K), u - 1 + + if dmp_zero_p(f, u) or dmp_one_p(cont, v, K): + return cont, f + else: + return cont, [ dmp_quo(c, cont, v, K) for c in f ] + + +def dup_cancel(f, g, K, include=True): + """ + Cancel common factors in a rational function `f/g`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_cancel(2*x**2 - 2, x**2 - 2*x + 1) + (2*x + 2, x - 1) + + """ + return dmp_cancel(f, g, 0, K, include=include) + + +def dmp_cancel(f, g, u, K, include=True): + """ + Cancel common factors in a rational function `f/g`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_cancel(2*x**2 - 2, x**2 - 2*x + 1) + (2*x + 2, x - 1) + + """ + K0 = None + + if K.is_Field and K.has_assoc_Ring: + K0, K = K, K.get_ring() + + cq, f = dmp_clear_denoms(f, u, K0, K, convert=True) + cp, g = dmp_clear_denoms(g, u, K0, K, convert=True) + else: + cp, cq = K.one, K.one + + _, p, q = dmp_inner_gcd(f, g, u, K) + + if K0 is not None: + _, cp, cq = K.cofactors(cp, cq) + + p = dmp_convert(p, u, K, K0) + q = dmp_convert(q, u, K, K0) + + K = K0 + + p_neg = K.is_negative(dmp_ground_LC(p, u, K)) + q_neg = K.is_negative(dmp_ground_LC(q, u, K)) + + if p_neg and q_neg: + p, q = dmp_neg(p, u, K), dmp_neg(q, u, K) + elif p_neg: + cp, p = -cp, dmp_neg(p, u, K) + elif q_neg: + cp, q = -cp, dmp_neg(q, u, K) + + if not include: + return cp, cq, p, q + + p = dmp_mul_ground(p, cp, u, K) + q = dmp_mul_ground(q, cq, u, K) + + return p, q diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/factortools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/factortools.py new file mode 100644 index 0000000000000000000000000000000000000000..021a6b06cb8802748deef6c69448ebc50503269b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/factortools.py @@ -0,0 +1,1648 @@ +"""Polynomial factorization routines in characteristic zero. """ + +from sympy.external.gmpy import GROUND_TYPES + +from sympy.core.random import _randint + +from sympy.polys.galoistools import ( + gf_from_int_poly, gf_to_int_poly, + gf_lshift, gf_add_mul, gf_mul, + gf_div, gf_rem, + gf_gcdex, + gf_sqf_p, + gf_factor_sqf, gf_factor) + +from sympy.polys.densebasic import ( + dup_LC, dmp_LC, dmp_ground_LC, + dup_TC, + dup_convert, dmp_convert, + dup_degree, dmp_degree, + dmp_degree_in, dmp_degree_list, + dmp_from_dict, + dmp_zero_p, + dmp_one, + dmp_nest, dmp_raise, + dup_strip, + dmp_ground, + dup_inflate, + dmp_exclude, dmp_include, + dmp_inject, dmp_eject, + dup_terms_gcd, dmp_terms_gcd) + +from sympy.polys.densearith import ( + dup_neg, dmp_neg, + dup_add, dmp_add, + dup_sub, dmp_sub, + dup_mul, dmp_mul, + dup_sqr, + dmp_pow, + dup_div, dmp_div, + dup_quo, dmp_quo, + dmp_expand, + dmp_add_mul, + dup_sub_mul, dmp_sub_mul, + dup_lshift, + dup_max_norm, dmp_max_norm, + dup_l1_norm, + dup_mul_ground, dmp_mul_ground, + dup_quo_ground, dmp_quo_ground) + +from sympy.polys.densetools import ( + dup_clear_denoms, dmp_clear_denoms, + dup_trunc, dmp_ground_trunc, + dup_content, + dup_monic, dmp_ground_monic, + dup_primitive, dmp_ground_primitive, + dmp_eval_tail, + dmp_eval_in, dmp_diff_eval_in, + dup_shift, dmp_shift, dup_mirror) + +from sympy.polys.euclidtools import ( + dmp_primitive, + dup_inner_gcd, dmp_inner_gcd) + +from sympy.polys.sqfreetools import ( + dup_sqf_p, + dup_sqf_norm, dmp_sqf_norm, + dup_sqf_part, dmp_sqf_part, + _dup_check_degrees, _dmp_check_degrees, + ) + +from sympy.polys.polyutils import _sort_factors +from sympy.polys.polyconfig import query + +from sympy.polys.polyerrors import ( + ExtraneousFactors, DomainError, CoercionFailed, EvaluationFailed) + +from sympy.utilities import subsets + +from math import ceil as _ceil, log as _log, log2 as _log2 + + +if GROUND_TYPES == 'flint': + from flint import fmpz_poly +else: + fmpz_poly = None + + +def dup_trial_division(f, factors, K): + """ + Determine multiplicities of factors for a univariate polynomial + using trial division. + + An error will be raised if any factor does not divide ``f``. + """ + result = [] + + for factor in factors: + k = 0 + + while True: + q, r = dup_div(f, factor, K) + + if not r: + f, k = q, k + 1 + else: + break + + if k == 0: + raise RuntimeError("trial division failed") + + result.append((factor, k)) + + return _sort_factors(result) + + +def dmp_trial_division(f, factors, u, K): + """ + Determine multiplicities of factors for a multivariate polynomial + using trial division. + + An error will be raised if any factor does not divide ``f``. + """ + result = [] + + for factor in factors: + k = 0 + + while True: + q, r = dmp_div(f, factor, u, K) + + if dmp_zero_p(r, u): + f, k = q, k + 1 + else: + break + + if k == 0: + raise RuntimeError("trial division failed") + + result.append((factor, k)) + + return _sort_factors(result) + + +def dup_zz_mignotte_bound(f, K): + """ + The Knuth-Cohen variant of Mignotte bound for + univariate polynomials in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> f = x**3 + 14*x**2 + 56*x + 64 + >>> R.dup_zz_mignotte_bound(f) + 152 + + By checking ``factor(f)`` we can see that max coeff is 8 + + Also consider a case that ``f`` is irreducible for example + ``f = 2*x**2 + 3*x + 4``. To avoid a bug for these cases, we return the + bound plus the max coefficient of ``f`` + + >>> f = 2*x**2 + 3*x + 4 + >>> R.dup_zz_mignotte_bound(f) + 6 + + Lastly, to see the difference between the new and the old Mignotte bound + consider the irreducible polynomial: + + >>> f = 87*x**7 + 4*x**6 + 80*x**5 + 17*x**4 + 9*x**3 + 12*x**2 + 49*x + 26 + >>> R.dup_zz_mignotte_bound(f) + 744 + + The new Mignotte bound is 744 whereas the old one (SymPy 1.5.1) is 1937664. + + + References + ========== + + ..[1] [Abbott13]_ + + """ + from sympy.functions.combinatorial.factorials import binomial + d = dup_degree(f) + delta = _ceil(d / 2) + delta2 = _ceil(delta / 2) + + # euclidean-norm + eucl_norm = K.sqrt( sum( cf**2 for cf in f ) ) + + # biggest values of binomial coefficients (p. 538 of reference) + t1 = binomial(delta - 1, delta2) + t2 = binomial(delta - 1, delta2 - 1) + + lc = K.abs(dup_LC(f, K)) # leading coefficient + bound = t1 * eucl_norm + t2 * lc # (p. 538 of reference) + bound += dup_max_norm(f, K) # add max coeff for irreducible polys + bound = _ceil(bound / 2) * 2 # round up to even integer + + return bound + +def dmp_zz_mignotte_bound(f, u, K): + """Mignotte bound for multivariate polynomials in `K[X]`. """ + a = dmp_max_norm(f, u, K) + b = abs(dmp_ground_LC(f, u, K)) + n = sum(dmp_degree_list(f, u)) + + return K.sqrt(K(n + 1))*2**n*a*b + + +def dup_zz_hensel_step(m, f, g, h, s, t, K): + """ + One step in Hensel lifting in `Z[x]`. + + Given positive integer `m` and `Z[x]` polynomials `f`, `g`, `h`, `s` + and `t` such that:: + + f = g*h (mod m) + s*g + t*h = 1 (mod m) + + lc(f) is not a zero divisor (mod m) + lc(h) = 1 + + deg(f) = deg(g) + deg(h) + deg(s) < deg(h) + deg(t) < deg(g) + + returns polynomials `G`, `H`, `S` and `T`, such that:: + + f = G*H (mod m**2) + S*G + T*H = 1 (mod m**2) + + References + ========== + + .. [1] [Gathen99]_ + + """ + M = m**2 + + e = dup_sub_mul(f, g, h, K) + e = dup_trunc(e, M, K) + + q, r = dup_div(dup_mul(s, e, K), h, K) + + q = dup_trunc(q, M, K) + r = dup_trunc(r, M, K) + + u = dup_add(dup_mul(t, e, K), dup_mul(q, g, K), K) + G = dup_trunc(dup_add(g, u, K), M, K) + H = dup_trunc(dup_add(h, r, K), M, K) + + u = dup_add(dup_mul(s, G, K), dup_mul(t, H, K), K) + b = dup_trunc(dup_sub(u, [K.one], K), M, K) + + c, d = dup_div(dup_mul(s, b, K), H, K) + + c = dup_trunc(c, M, K) + d = dup_trunc(d, M, K) + + u = dup_add(dup_mul(t, b, K), dup_mul(c, G, K), K) + S = dup_trunc(dup_sub(s, d, K), M, K) + T = dup_trunc(dup_sub(t, u, K), M, K) + + return G, H, S, T + + +def dup_zz_hensel_lift(p, f, f_list, l, K): + r""" + Multifactor Hensel lifting in `Z[x]`. + + Given a prime `p`, polynomial `f` over `Z[x]` such that `lc(f)` + is a unit modulo `p`, monic pair-wise coprime polynomials `f_i` + over `Z[x]` satisfying:: + + f = lc(f) f_1 ... f_r (mod p) + + and a positive integer `l`, returns a list of monic polynomials + `F_1,\ F_2,\ \dots,\ F_r` satisfying:: + + f = lc(f) F_1 ... F_r (mod p**l) + + F_i = f_i (mod p), i = 1..r + + References + ========== + + .. [1] [Gathen99]_ + + """ + r = len(f_list) + lc = dup_LC(f, K) + + if r == 1: + F = dup_mul_ground(f, K.gcdex(lc, p**l)[0], K) + return [ dup_trunc(F, p**l, K) ] + + m = p + k = r // 2 + d = int(_ceil(_log2(l))) + + g = gf_from_int_poly([lc], p) + + for f_i in f_list[:k]: + g = gf_mul(g, gf_from_int_poly(f_i, p), p, K) + + h = gf_from_int_poly(f_list[k], p) + + for f_i in f_list[k + 1:]: + h = gf_mul(h, gf_from_int_poly(f_i, p), p, K) + + s, t, _ = gf_gcdex(g, h, p, K) + + g = gf_to_int_poly(g, p) + h = gf_to_int_poly(h, p) + s = gf_to_int_poly(s, p) + t = gf_to_int_poly(t, p) + + for _ in range(1, d + 1): + (g, h, s, t), m = dup_zz_hensel_step(m, f, g, h, s, t, K), m**2 + + return dup_zz_hensel_lift(p, g, f_list[:k], l, K) \ + + dup_zz_hensel_lift(p, h, f_list[k:], l, K) + +def _test_pl(fc, q, pl): + if q > pl // 2: + q = q - pl + if not q: + return True + return fc % q == 0 + +def dup_zz_zassenhaus(f, K): + """Factor primitive square-free polynomials in `Z[x]`. """ + n = dup_degree(f) + + if n == 1: + return [f] + + from sympy.ntheory import isprime + + fc = f[-1] + A = dup_max_norm(f, K) + b = dup_LC(f, K) + B = int(abs(K.sqrt(K(n + 1))*2**n*A*b)) + C = int((n + 1)**(2*n)*A**(2*n - 1)) + gamma = int(_ceil(2*_log2(C))) + bound = int(2*gamma*_log(gamma)) + a = [] + # choose a prime number `p` such that `f` be square free in Z_p + # if there are many factors in Z_p, choose among a few different `p` + # the one with fewer factors + for px in range(3, bound + 1): + if not isprime(px) or b % px == 0: + continue + + px = K.convert(px) + + F = gf_from_int_poly(f, px) + + if not gf_sqf_p(F, px, K): + continue + fsqfx = gf_factor_sqf(F, px, K)[1] + a.append((px, fsqfx)) + if len(fsqfx) < 15 or len(a) > 4: + break + p, fsqf = min(a, key=lambda x: len(x[1])) + + l = int(_ceil(_log(2*B + 1, p))) + + modular = [gf_to_int_poly(ff, p) for ff in fsqf] + + g = dup_zz_hensel_lift(p, f, modular, l, K) + + sorted_T = range(len(g)) + T = set(sorted_T) + factors, s = [], 1 + pl = p**l + + while 2*s <= len(T): + for S in subsets(sorted_T, s): + # lift the constant coefficient of the product `G` of the factors + # in the subset `S`; if it is does not divide `fc`, `G` does + # not divide the input polynomial + + if b == 1: + q = 1 + for i in S: + q = q*g[i][-1] + q = q % pl + if not _test_pl(fc, q, pl): + continue + else: + G = [b] + for i in S: + G = dup_mul(G, g[i], K) + G = dup_trunc(G, pl, K) + G = dup_primitive(G, K)[1] + q = G[-1] + if q and fc % q != 0: + continue + + H = [b] + S = set(S) + T_S = T - S + + if b == 1: + G = [b] + for i in S: + G = dup_mul(G, g[i], K) + G = dup_trunc(G, pl, K) + + for i in T_S: + H = dup_mul(H, g[i], K) + + H = dup_trunc(H, pl, K) + + G_norm = dup_l1_norm(G, K) + H_norm = dup_l1_norm(H, K) + + if G_norm*H_norm <= B: + T = T_S + sorted_T = [i for i in sorted_T if i not in S] + + G = dup_primitive(G, K)[1] + f = dup_primitive(H, K)[1] + + factors.append(G) + b = dup_LC(f, K) + + break + else: + s += 1 + + return factors + [f] + + +def dup_zz_irreducible_p(f, K): + """Test irreducibility using Eisenstein's criterion. """ + lc = dup_LC(f, K) + tc = dup_TC(f, K) + + e_fc = dup_content(f[1:], K) + + if e_fc: + from sympy.ntheory import factorint + e_ff = factorint(int(e_fc)) + + for p in e_ff.keys(): + if (lc % p) and (tc % p**2): + return True + + +def dup_cyclotomic_p(f, K, irreducible=False): + """ + Efficiently test if ``f`` is a cyclotomic polynomial. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1 + >>> R.dup_cyclotomic_p(f) + False + + >>> g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1 + >>> R.dup_cyclotomic_p(g) + True + + References + ========== + + Bradford, Russell J., and James H. Davenport. "Effective tests for + cyclotomic polynomials." In International Symposium on Symbolic and + Algebraic Computation, pp. 244-251. Springer, Berlin, Heidelberg, 1988. + + """ + if K.is_QQ: + try: + K0, K = K, K.get_ring() + f = dup_convert(f, K0, K) + except CoercionFailed: + return False + elif not K.is_ZZ: + return False + + lc = dup_LC(f, K) + tc = dup_TC(f, K) + + if lc != 1 or (tc != -1 and tc != 1): + return False + + if not irreducible: + coeff, factors = dup_factor_list(f, K) + + if coeff != K.one or factors != [(f, 1)]: + return False + + n = dup_degree(f) + g, h = [], [] + + for i in range(n, -1, -2): + g.insert(0, f[i]) + + for i in range(n - 1, -1, -2): + h.insert(0, f[i]) + + g = dup_sqr(dup_strip(g), K) + h = dup_sqr(dup_strip(h), K) + + F = dup_sub(g, dup_lshift(h, 1, K), K) + + if K.is_negative(dup_LC(F, K)): + F = dup_neg(F, K) + + if F == f: + return True + + g = dup_mirror(f, K) + + if K.is_negative(dup_LC(g, K)): + g = dup_neg(g, K) + + if F == g and dup_cyclotomic_p(g, K): + return True + + G = dup_sqf_part(F, K) + + if dup_sqr(G, K) == F and dup_cyclotomic_p(G, K): + return True + + return False + + +def dup_zz_cyclotomic_poly(n, K): + """Efficiently generate n-th cyclotomic polynomial. """ + from sympy.ntheory import factorint + h = [K.one, -K.one] + + for p, k in factorint(n).items(): + h = dup_quo(dup_inflate(h, p, K), h, K) + h = dup_inflate(h, p**(k - 1), K) + + return h + + +def _dup_cyclotomic_decompose(n, K): + from sympy.ntheory import factorint + + H = [[K.one, -K.one]] + + for p, k in factorint(n).items(): + Q = [ dup_quo(dup_inflate(h, p, K), h, K) for h in H ] + H.extend(Q) + + for i in range(1, k): + Q = [ dup_inflate(q, p, K) for q in Q ] + H.extend(Q) + + return H + + +def dup_zz_cyclotomic_factor(f, K): + """ + Efficiently factor polynomials `x**n - 1` and `x**n + 1` in `Z[x]`. + + Given a univariate polynomial `f` in `Z[x]` returns a list of factors + of `f`, provided that `f` is in the form `x**n - 1` or `x**n + 1` for + `n >= 1`. Otherwise returns None. + + Factorization is performed using cyclotomic decomposition of `f`, + which makes this method much faster that any other direct factorization + approach (e.g. Zassenhaus's). + + References + ========== + + .. [1] [Weisstein09]_ + + """ + lc_f, tc_f = dup_LC(f, K), dup_TC(f, K) + + if dup_degree(f) <= 0: + return None + + if lc_f != 1 or tc_f not in [-1, 1]: + return None + + if any(bool(cf) for cf in f[1:-1]): + return None + + n = dup_degree(f) + F = _dup_cyclotomic_decompose(n, K) + + if not K.is_one(tc_f): + return F + else: + H = [] + + for h in _dup_cyclotomic_decompose(2*n, K): + if h not in F: + H.append(h) + + return H + + +def dup_zz_factor_sqf(f, K): + """Factor square-free (non-primitive) polynomials in `Z[x]`. """ + cont, g = dup_primitive(f, K) + + n = dup_degree(g) + + if dup_LC(g, K) < 0: + cont, g = -cont, dup_neg(g, K) + + if n <= 0: + return cont, [] + elif n == 1: + return cont, [g] + + if query('USE_IRREDUCIBLE_IN_FACTOR'): + if dup_zz_irreducible_p(g, K): + return cont, [g] + + factors = None + + if query('USE_CYCLOTOMIC_FACTOR'): + factors = dup_zz_cyclotomic_factor(g, K) + + if factors is None: + factors = dup_zz_zassenhaus(g, K) + + return cont, _sort_factors(factors, multiple=False) + + +def dup_zz_factor(f, K): + """ + Factor (non square-free) polynomials in `Z[x]`. + + Given a univariate polynomial `f` in `Z[x]` computes its complete + factorization `f_1, ..., f_n` into irreducibles over integers:: + + f = content(f) f_1**k_1 ... f_n**k_n + + The factorization is computed by reducing the input polynomial + into a primitive square-free polynomial and factoring it using + Zassenhaus algorithm. Trial division is used to recover the + multiplicities of factors. + + The result is returned as a tuple consisting of:: + + (content(f), [(f_1, k_1), ..., (f_n, k_n)) + + Examples + ======== + + Consider the polynomial `f = 2*x**4 - 2`:: + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_zz_factor(2*x**4 - 2) + (2, [(x - 1, 1), (x + 1, 1), (x**2 + 1, 1)]) + + In result we got the following factorization:: + + f = 2 (x - 1) (x + 1) (x**2 + 1) + + Note that this is a complete factorization over integers, + however over Gaussian integers we can factor the last term. + + By default, polynomials `x**n - 1` and `x**n + 1` are factored + using cyclotomic decomposition to speedup computations. To + disable this behaviour set cyclotomic=False. + + References + ========== + + .. [1] [Gathen99]_ + + """ + if GROUND_TYPES == 'flint': + f_flint = fmpz_poly(f[::-1]) + cont, factors = f_flint.factor() + factors = [(fac.coeffs()[::-1], exp) for fac, exp in factors] + return cont, _sort_factors(factors) + + cont, g = dup_primitive(f, K) + + n = dup_degree(g) + + if dup_LC(g, K) < 0: + cont, g = -cont, dup_neg(g, K) + + if n <= 0: + return cont, [] + elif n == 1: + return cont, [(g, 1)] + + if query('USE_IRREDUCIBLE_IN_FACTOR'): + if dup_zz_irreducible_p(g, K): + return cont, [(g, 1)] + + g = dup_sqf_part(g, K) + H = None + + if query('USE_CYCLOTOMIC_FACTOR'): + H = dup_zz_cyclotomic_factor(g, K) + + if H is None: + H = dup_zz_zassenhaus(g, K) + + factors = dup_trial_division(f, H, K) + + _dup_check_degrees(f, factors) + + return cont, factors + + +def dmp_zz_wang_non_divisors(E, cs, ct, K): + """Wang/EEZ: Compute a set of valid divisors. """ + result = [ cs*ct ] + + for q in E: + q = abs(q) + + for r in reversed(result): + while r != 1: + r = K.gcd(r, q) + q = q // r + + if K.is_one(q): + return None + + result.append(q) + + return result[1:] + + +def dmp_zz_wang_test_points(f, T, ct, A, u, K): + """Wang/EEZ: Test evaluation points for suitability. """ + if not dmp_eval_tail(dmp_LC(f, K), A, u - 1, K): + raise EvaluationFailed('no luck') + + g = dmp_eval_tail(f, A, u, K) + + if not dup_sqf_p(g, K): + raise EvaluationFailed('no luck') + + c, h = dup_primitive(g, K) + + if K.is_negative(dup_LC(h, K)): + c, h = -c, dup_neg(h, K) + + v = u - 1 + + E = [ dmp_eval_tail(t, A, v, K) for t, _ in T ] + D = dmp_zz_wang_non_divisors(E, c, ct, K) + + if D is not None: + return c, h, E + else: + raise EvaluationFailed('no luck') + + +def dmp_zz_wang_lead_coeffs(f, T, cs, E, H, A, u, K): + """Wang/EEZ: Compute correct leading coefficients. """ + C, J, v = [], [0]*len(E), u - 1 + + for h in H: + c = dmp_one(v, K) + d = dup_LC(h, K)*cs + + for i in reversed(range(len(E))): + k, e, (t, _) = 0, E[i], T[i] + + while not (d % e): + d, k = d//e, k + 1 + + if k != 0: + c, J[i] = dmp_mul(c, dmp_pow(t, k, v, K), v, K), 1 + + C.append(c) + + if not all(J): + raise ExtraneousFactors # pragma: no cover + + CC, HH = [], [] + + for c, h in zip(C, H): + d = dmp_eval_tail(c, A, v, K) + lc = dup_LC(h, K) + + if K.is_one(cs): + cc = lc//d + else: + g = K.gcd(lc, d) + d, cc = d//g, lc//g + h, cs = dup_mul_ground(h, d, K), cs//d + + c = dmp_mul_ground(c, cc, v, K) + + CC.append(c) + HH.append(h) + + if K.is_one(cs): + return f, HH, CC + + CCC, HHH = [], [] + + for c, h in zip(CC, HH): + CCC.append(dmp_mul_ground(c, cs, v, K)) + HHH.append(dmp_mul_ground(h, cs, 0, K)) + + f = dmp_mul_ground(f, cs**(len(H) - 1), u, K) + + return f, HHH, CCC + + +def dup_zz_diophantine(F, m, p, K): + """Wang/EEZ: Solve univariate Diophantine equations. """ + if len(F) == 2: + a, b = F + + f = gf_from_int_poly(a, p) + g = gf_from_int_poly(b, p) + + s, t, G = gf_gcdex(g, f, p, K) + + s = gf_lshift(s, m, K) + t = gf_lshift(t, m, K) + + q, s = gf_div(s, f, p, K) + + t = gf_add_mul(t, q, g, p, K) + + s = gf_to_int_poly(s, p) + t = gf_to_int_poly(t, p) + + result = [s, t] + else: + G = [F[-1]] + + for f in reversed(F[1:-1]): + G.insert(0, dup_mul(f, G[0], K)) + + S, T = [], [[1]] + + for f, g in zip(F, G): + t, s = dmp_zz_diophantine([g, f], T[-1], [], 0, p, 1, K) + T.append(t) + S.append(s) + + result, S = [], S + [T[-1]] + + for s, f in zip(S, F): + s = gf_from_int_poly(s, p) + f = gf_from_int_poly(f, p) + + r = gf_rem(gf_lshift(s, m, K), f, p, K) + s = gf_to_int_poly(r, p) + + result.append(s) + + return result + + +def dmp_zz_diophantine(F, c, A, d, p, u, K): + """Wang/EEZ: Solve multivariate Diophantine equations. """ + if not A: + S = [ [] for _ in F ] + n = dup_degree(c) + + for i, coeff in enumerate(c): + if not coeff: + continue + + T = dup_zz_diophantine(F, n - i, p, K) + + for j, (s, t) in enumerate(zip(S, T)): + t = dup_mul_ground(t, coeff, K) + S[j] = dup_trunc(dup_add(s, t, K), p, K) + else: + n = len(A) + e = dmp_expand(F, u, K) + + a, A = A[-1], A[:-1] + B, G = [], [] + + for f in F: + B.append(dmp_quo(e, f, u, K)) + G.append(dmp_eval_in(f, a, n, u, K)) + + C = dmp_eval_in(c, a, n, u, K) + + v = u - 1 + + S = dmp_zz_diophantine(G, C, A, d, p, v, K) + S = [ dmp_raise(s, 1, v, K) for s in S ] + + for s, b in zip(S, B): + c = dmp_sub_mul(c, s, b, u, K) + + c = dmp_ground_trunc(c, p, u, K) + + m = dmp_nest([K.one, -a], n, K) + M = dmp_one(n, K) + + for k in range(0, d): + if dmp_zero_p(c, u): + break + + M = dmp_mul(M, m, u, K) + C = dmp_diff_eval_in(c, k + 1, a, n, u, K) + + if not dmp_zero_p(C, v): + C = dmp_quo_ground(C, K.factorial(K(k) + 1), v, K) + T = dmp_zz_diophantine(G, C, A, d, p, v, K) + + for i, t in enumerate(T): + T[i] = dmp_mul(dmp_raise(t, 1, v, K), M, u, K) + + for i, (s, t) in enumerate(zip(S, T)): + S[i] = dmp_add(s, t, u, K) + + for t, b in zip(T, B): + c = dmp_sub_mul(c, t, b, u, K) + + c = dmp_ground_trunc(c, p, u, K) + + S = [ dmp_ground_trunc(s, p, u, K) for s in S ] + + return S + + +def dmp_zz_wang_hensel_lifting(f, H, LC, A, p, u, K): + """Wang/EEZ: Parallel Hensel lifting algorithm. """ + S, n, v = [f], len(A), u - 1 + + H = list(H) + + for i, a in enumerate(reversed(A[1:])): + s = dmp_eval_in(S[0], a, n - i, u - i, K) + S.insert(0, dmp_ground_trunc(s, p, v - i, K)) + + d = max(dmp_degree_list(f, u)[1:]) + + for j, s, a in zip(range(2, n + 2), S, A): + G, w = list(H), j - 1 + + I, J = A[:j - 2], A[j - 1:] + + for i, (h, lc) in enumerate(zip(H, LC)): + lc = dmp_ground_trunc(dmp_eval_tail(lc, J, v, K), p, w - 1, K) + H[i] = [lc] + dmp_raise(h[1:], 1, w - 1, K) + + m = dmp_nest([K.one, -a], w, K) + M = dmp_one(w, K) + + c = dmp_sub(s, dmp_expand(H, w, K), w, K) + + dj = dmp_degree_in(s, w, w) + + for k in range(0, dj): + if dmp_zero_p(c, w): + break + + M = dmp_mul(M, m, w, K) + C = dmp_diff_eval_in(c, k + 1, a, w, w, K) + + if not dmp_zero_p(C, w - 1): + C = dmp_quo_ground(C, K.factorial(K(k) + 1), w - 1, K) + T = dmp_zz_diophantine(G, C, I, d, p, w - 1, K) + + for i, (h, t) in enumerate(zip(H, T)): + h = dmp_add_mul(h, dmp_raise(t, 1, w - 1, K), M, w, K) + H[i] = dmp_ground_trunc(h, p, w, K) + + h = dmp_sub(s, dmp_expand(H, w, K), w, K) + c = dmp_ground_trunc(h, p, w, K) + + if dmp_expand(H, u, K) != f: + raise ExtraneousFactors # pragma: no cover + else: + return H + + +def dmp_zz_wang(f, u, K, mod=None, seed=None): + r""" + Factor primitive square-free polynomials in `Z[X]`. + + Given a multivariate polynomial `f` in `Z[x_1,...,x_n]`, which is + primitive and square-free in `x_1`, computes factorization of `f` into + irreducibles over integers. + + The procedure is based on Wang's Enhanced Extended Zassenhaus + algorithm. The algorithm works by viewing `f` as a univariate polynomial + in `Z[x_2,...,x_n][x_1]`, for which an evaluation mapping is computed:: + + x_2 -> a_2, ..., x_n -> a_n + + where `a_i`, for `i = 2, \dots, n`, are carefully chosen integers. The + mapping is used to transform `f` into a univariate polynomial in `Z[x_1]`, + which can be factored efficiently using Zassenhaus algorithm. The last + step is to lift univariate factors to obtain true multivariate + factors. For this purpose a parallel Hensel lifting procedure is used. + + The parameter ``seed`` is passed to _randint and can be used to seed randint + (when an integer) or (for testing purposes) can be a sequence of numbers. + + References + ========== + + .. [1] [Wang78]_ + .. [2] [Geddes92]_ + + """ + from sympy.ntheory import nextprime + + randint = _randint(seed) + + ct, T = dmp_zz_factor(dmp_LC(f, K), u - 1, K) + + b = dmp_zz_mignotte_bound(f, u, K) + p = K(nextprime(b)) + + if mod is None: + if u == 1: + mod = 2 + else: + mod = 1 + + history, configs, A, r = set(), [], [K.zero]*u, None + + try: + cs, s, E = dmp_zz_wang_test_points(f, T, ct, A, u, K) + + _, H = dup_zz_factor_sqf(s, K) + + r = len(H) + + if r == 1: + return [f] + + configs = [(s, cs, E, H, A)] + except EvaluationFailed: + pass + + eez_num_configs = query('EEZ_NUMBER_OF_CONFIGS') + eez_num_tries = query('EEZ_NUMBER_OF_TRIES') + eez_mod_step = query('EEZ_MODULUS_STEP') + + while len(configs) < eez_num_configs: + for _ in range(eez_num_tries): + A = [ K(randint(-mod, mod)) for _ in range(u) ] + + if tuple(A) not in history: + history.add(tuple(A)) + else: + continue + + try: + cs, s, E = dmp_zz_wang_test_points(f, T, ct, A, u, K) + except EvaluationFailed: + continue + + _, H = dup_zz_factor_sqf(s, K) + + rr = len(H) + + if r is not None: + if rr != r: # pragma: no cover + if rr < r: + configs, r = [], rr + else: + continue + else: + r = rr + + if r == 1: + return [f] + + configs.append((s, cs, E, H, A)) + + if len(configs) == eez_num_configs: + break + else: + mod += eez_mod_step + + s_norm, s_arg, i = None, 0, 0 + + for s, _, _, _, _ in configs: + _s_norm = dup_max_norm(s, K) + + if s_norm is not None: + if _s_norm < s_norm: + s_norm = _s_norm + s_arg = i + else: + s_norm = _s_norm + + i += 1 + + _, cs, E, H, A = configs[s_arg] + orig_f = f + + try: + f, H, LC = dmp_zz_wang_lead_coeffs(f, T, cs, E, H, A, u, K) + factors = dmp_zz_wang_hensel_lifting(f, H, LC, A, p, u, K) + except ExtraneousFactors: # pragma: no cover + if query('EEZ_RESTART_IF_NEEDED'): + return dmp_zz_wang(orig_f, u, K, mod + 1) + else: + raise ExtraneousFactors( + "we need to restart algorithm with better parameters") + + result = [] + + for f in factors: + _, f = dmp_ground_primitive(f, u, K) + + if K.is_negative(dmp_ground_LC(f, u, K)): + f = dmp_neg(f, u, K) + + result.append(f) + + return result + + +def dmp_zz_factor(f, u, K): + r""" + Factor (non square-free) polynomials in `Z[X]`. + + Given a multivariate polynomial `f` in `Z[x]` computes its complete + factorization `f_1, \dots, f_n` into irreducibles over integers:: + + f = content(f) f_1**k_1 ... f_n**k_n + + The factorization is computed by reducing the input polynomial + into a primitive square-free polynomial and factoring it using + Enhanced Extended Zassenhaus (EEZ) algorithm. Trial division + is used to recover the multiplicities of factors. + + The result is returned as a tuple consisting of:: + + (content(f), [(f_1, k_1), ..., (f_n, k_n)) + + Consider polynomial `f = 2*(x**2 - y**2)`:: + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_zz_factor(2*x**2 - 2*y**2) + (2, [(x - y, 1), (x + y, 1)]) + + In result we got the following factorization:: + + f = 2 (x - y) (x + y) + + References + ========== + + .. [1] [Gathen99]_ + + """ + if not u: + return dup_zz_factor(f, K) + + if dmp_zero_p(f, u): + return K.zero, [] + + cont, g = dmp_ground_primitive(f, u, K) + + if dmp_ground_LC(g, u, K) < 0: + cont, g = -cont, dmp_neg(g, u, K) + + if all(d <= 0 for d in dmp_degree_list(g, u)): + return cont, [] + + G, g = dmp_primitive(g, u, K) + + factors = [] + + if dmp_degree(g, u) > 0: + g = dmp_sqf_part(g, u, K) + H = dmp_zz_wang(g, u, K) + factors = dmp_trial_division(f, H, u, K) + + for g, k in dmp_zz_factor(G, u - 1, K)[1]: + factors.insert(0, ([g], k)) + + _dmp_check_degrees(f, u, factors) + + return cont, _sort_factors(factors) + + +def dup_qq_i_factor(f, K0): + """Factor univariate polynomials into irreducibles in `QQ_I[x]`. """ + # Factor in QQ + K1 = K0.as_AlgebraicField() + f = dup_convert(f, K0, K1) + coeff, factors = dup_factor_list(f, K1) + factors = [(dup_convert(fac, K1, K0), i) for fac, i in factors] + coeff = K0.convert(coeff, K1) + return coeff, factors + + +def dup_zz_i_factor(f, K0): + """Factor univariate polynomials into irreducibles in `ZZ_I[x]`. """ + # First factor in QQ_I + K1 = K0.get_field() + f = dup_convert(f, K0, K1) + coeff, factors = dup_qq_i_factor(f, K1) + + new_factors = [] + for fac, i in factors: + # Extract content + fac_denom, fac_num = dup_clear_denoms(fac, K1) + fac_num_ZZ_I = dup_convert(fac_num, K1, K0) + content, fac_prim = dmp_ground_primitive(fac_num_ZZ_I, 0, K0) + + coeff = (coeff * content ** i) // fac_denom ** i + new_factors.append((fac_prim, i)) + + factors = new_factors + coeff = K0.convert(coeff, K1) + return coeff, factors + + +def dmp_qq_i_factor(f, u, K0): + """Factor multivariate polynomials into irreducibles in `QQ_I[X]`. """ + # Factor in QQ + K1 = K0.as_AlgebraicField() + f = dmp_convert(f, u, K0, K1) + coeff, factors = dmp_factor_list(f, u, K1) + factors = [(dmp_convert(fac, u, K1, K0), i) for fac, i in factors] + coeff = K0.convert(coeff, K1) + return coeff, factors + + +def dmp_zz_i_factor(f, u, K0): + """Factor multivariate polynomials into irreducibles in `ZZ_I[X]`. """ + # First factor in QQ_I + K1 = K0.get_field() + f = dmp_convert(f, u, K0, K1) + coeff, factors = dmp_qq_i_factor(f, u, K1) + + new_factors = [] + for fac, i in factors: + # Extract content + fac_denom, fac_num = dmp_clear_denoms(fac, u, K1) + fac_num_ZZ_I = dmp_convert(fac_num, u, K1, K0) + content, fac_prim = dmp_ground_primitive(fac_num_ZZ_I, u, K0) + + coeff = (coeff * content ** i) // fac_denom ** i + new_factors.append((fac_prim, i)) + + factors = new_factors + coeff = K0.convert(coeff, K1) + return coeff, factors + + +def dup_ext_factor(f, K): + r"""Factor univariate polynomials over algebraic number fields. + + The domain `K` must be an algebraic number field `k(a)` (see :ref:`QQ(a)`). + + Examples + ======== + + First define the algebraic number field `K = \mathbb{Q}(\sqrt{2})`: + + >>> from sympy import QQ, sqrt + >>> from sympy.polys.factortools import dup_ext_factor + >>> K = QQ.algebraic_field(sqrt(2)) + + We can now factorise the polynomial `x^2 - 2` over `K`: + + >>> p = [K(1), K(0), K(-2)] # x^2 - 2 + >>> p1 = [K(1), -K.unit] # x - sqrt(2) + >>> p2 = [K(1), +K.unit] # x + sqrt(2) + >>> dup_ext_factor(p, K) == (K.one, [(p1, 1), (p2, 1)]) + True + + Usually this would be done at a higher level: + + >>> from sympy import factor + >>> from sympy.abc import x + >>> factor(x**2 - 2, extension=sqrt(2)) + (x - sqrt(2))*(x + sqrt(2)) + + Explanation + =========== + + Uses Trager's algorithm. In particular this function is algorithm + ``alg_factor`` from [Trager76]_. + + If `f` is a polynomial in `k(a)[x]` then its norm `g(x)` is a polynomial in + `k[x]`. If `g(x)` is square-free and has irreducible factors `g_1(x)`, + `g_2(x)`, `\cdots` then the irreducible factors of `f` in `k(a)[x]` are + given by `f_i(x) = \gcd(f(x), g_i(x))` where the GCD is computed in + `k(a)[x]`. + + The first step in Trager's algorithm is to find an integer shift `s` so + that `f(x-sa)` has square-free norm. Then the norm is factorized in `k[x]` + and the GCD of (shifted) `f` with each factor gives the shifted factors of + `f`. At the end the shift is undone to recover the unshifted factors of `f` + in `k(a)[x]`. + + The algorithm reduces the problem of factorization in `k(a)[x]` to + factorization in `k[x]` with the main additional steps being to compute the + norm (a resultant calculation in `k[x,y]`) and some polynomial GCDs in + `k(a)[x]`. + + In practice in SymPy the base field `k` will be the rationals :ref:`QQ` and + this function factorizes a polynomial with coefficients in an algebraic + number field like `\mathbb{Q}(\sqrt{2})`. + + See Also + ======== + + dmp_ext_factor: + Analogous function for multivariate polynomials over ``k(a)``. + dup_sqf_norm: + Subroutine ``sqfr_norm`` also from [Trager76]_. + sympy.polys.polytools.factor: + The high-level function that ultimately uses this function as needed. + """ + n, lc = dup_degree(f), dup_LC(f, K) + + f = dup_monic(f, K) + + if n <= 0: + return lc, [] + if n == 1: + return lc, [(f, 1)] + + f, F = dup_sqf_part(f, K), f + s, g, r = dup_sqf_norm(f, K) + + factors = dup_factor_list_include(r, K.dom) + + if len(factors) == 1: + return lc, [(f, n//dup_degree(f))] + + H = s*K.unit + + for i, (factor, _) in enumerate(factors): + h = dup_convert(factor, K.dom, K) + h, _, g = dup_inner_gcd(h, g, K) + h = dup_shift(h, H, K) + factors[i] = h + + factors = dup_trial_division(F, factors, K) + + _dup_check_degrees(F, factors) + + return lc, factors + + +def dmp_ext_factor(f, u, K): + r"""Factor multivariate polynomials over algebraic number fields. + + The domain `K` must be an algebraic number field `k(a)` (see :ref:`QQ(a)`). + + Examples + ======== + + First define the algebraic number field `K = \mathbb{Q}(\sqrt{2})`: + + >>> from sympy import QQ, sqrt + >>> from sympy.polys.factortools import dmp_ext_factor + >>> K = QQ.algebraic_field(sqrt(2)) + + We can now factorise the polynomial `x^2 y^2 - 2` over `K`: + + >>> p = [[K(1),K(0),K(0)], [], [K(-2)]] # x**2*y**2 - 2 + >>> p1 = [[K(1),K(0)], [-K.unit]] # x*y - sqrt(2) + >>> p2 = [[K(1),K(0)], [+K.unit]] # x*y + sqrt(2) + >>> dmp_ext_factor(p, 1, K) == (K.one, [(p1, 1), (p2, 1)]) + True + + Usually this would be done at a higher level: + + >>> from sympy import factor + >>> from sympy.abc import x, y + >>> factor(x**2*y**2 - 2, extension=sqrt(2)) + (x*y - sqrt(2))*(x*y + sqrt(2)) + + Explanation + =========== + + This is Trager's algorithm for multivariate polynomials. In particular this + function is algorithm ``alg_factor`` from [Trager76]_. + + See :func:`dup_ext_factor` for explanation. + + See Also + ======== + + dup_ext_factor: + Analogous function for univariate polynomials over ``k(a)``. + dmp_sqf_norm: + Multivariate version of subroutine ``sqfr_norm`` also from [Trager76]_. + sympy.polys.polytools.factor: + The high-level function that ultimately uses this function as needed. + """ + if not u: + return dup_ext_factor(f, K) + + lc = dmp_ground_LC(f, u, K) + f = dmp_ground_monic(f, u, K) + + if all(d <= 0 for d in dmp_degree_list(f, u)): + return lc, [] + + f, F = dmp_sqf_part(f, u, K), f + s, g, r = dmp_sqf_norm(f, u, K) + + factors = dmp_factor_list_include(r, u, K.dom) + + if len(factors) == 1: + factors = [f] + else: + for i, (factor, _) in enumerate(factors): + h = dmp_convert(factor, u, K.dom, K) + h, _, g = dmp_inner_gcd(h, g, u, K) + a = [si*K.unit for si in s] + h = dmp_shift(h, a, u, K) + factors[i] = h + + result = dmp_trial_division(F, factors, u, K) + + _dmp_check_degrees(F, u, result) + + return lc, result + + +def dup_gf_factor(f, K): + """Factor univariate polynomials over finite fields. """ + f = dup_convert(f, K, K.dom) + + coeff, factors = gf_factor(f, K.mod, K.dom) + + for i, (f, k) in enumerate(factors): + factors[i] = (dup_convert(f, K.dom, K), k) + + return K.convert(coeff, K.dom), factors + + +def dmp_gf_factor(f, u, K): + """Factor multivariate polynomials over finite fields. """ + raise NotImplementedError('multivariate polynomials over finite fields') + + +def dup_factor_list(f, K0): + """Factor univariate polynomials into irreducibles in `K[x]`. """ + j, f = dup_terms_gcd(f, K0) + cont, f = dup_primitive(f, K0) + + if K0.is_FiniteField: + coeff, factors = dup_gf_factor(f, K0) + elif K0.is_Algebraic: + coeff, factors = dup_ext_factor(f, K0) + elif K0.is_GaussianRing: + coeff, factors = dup_zz_i_factor(f, K0) + elif K0.is_GaussianField: + coeff, factors = dup_qq_i_factor(f, K0) + else: + if not K0.is_Exact: + K0_inexact, K0 = K0, K0.get_exact() + f = dup_convert(f, K0_inexact, K0) + else: + K0_inexact = None + + if K0.is_Field: + K = K0.get_ring() + + denom, f = dup_clear_denoms(f, K0, K) + f = dup_convert(f, K0, K) + else: + K = K0 + + if K.is_ZZ: + coeff, factors = dup_zz_factor(f, K) + elif K.is_Poly: + f, u = dmp_inject(f, 0, K) + + coeff, factors = dmp_factor_list(f, u, K.dom) + + for i, (f, k) in enumerate(factors): + factors[i] = (dmp_eject(f, u, K), k) + + coeff = K.convert(coeff, K.dom) + else: # pragma: no cover + raise DomainError('factorization not supported over %s' % K0) + + if K0.is_Field: + for i, (f, k) in enumerate(factors): + factors[i] = (dup_convert(f, K, K0), k) + + coeff = K0.convert(coeff, K) + coeff = K0.quo(coeff, denom) + + if K0_inexact: + for i, (f, k) in enumerate(factors): + max_norm = dup_max_norm(f, K0) + f = dup_quo_ground(f, max_norm, K0) + f = dup_convert(f, K0, K0_inexact) + factors[i] = (f, k) + coeff = K0.mul(coeff, K0.pow(max_norm, k)) + + coeff = K0_inexact.convert(coeff, K0) + K0 = K0_inexact + + if j: + factors.insert(0, ([K0.one, K0.zero], j)) + + return coeff*cont, _sort_factors(factors) + + +def dup_factor_list_include(f, K): + """Factor univariate polynomials into irreducibles in `K[x]`. """ + coeff, factors = dup_factor_list(f, K) + + if not factors: + return [(dup_strip([coeff]), 1)] + else: + g = dup_mul_ground(factors[0][0], coeff, K) + return [(g, factors[0][1])] + factors[1:] + + +def dmp_factor_list(f, u, K0): + """Factor multivariate polynomials into irreducibles in `K[X]`. """ + if not u: + return dup_factor_list(f, K0) + + J, f = dmp_terms_gcd(f, u, K0) + cont, f = dmp_ground_primitive(f, u, K0) + + if K0.is_FiniteField: # pragma: no cover + coeff, factors = dmp_gf_factor(f, u, K0) + elif K0.is_Algebraic: + coeff, factors = dmp_ext_factor(f, u, K0) + elif K0.is_GaussianRing: + coeff, factors = dmp_zz_i_factor(f, u, K0) + elif K0.is_GaussianField: + coeff, factors = dmp_qq_i_factor(f, u, K0) + else: + if not K0.is_Exact: + K0_inexact, K0 = K0, K0.get_exact() + f = dmp_convert(f, u, K0_inexact, K0) + else: + K0_inexact = None + + if K0.is_Field: + K = K0.get_ring() + + denom, f = dmp_clear_denoms(f, u, K0, K) + f = dmp_convert(f, u, K0, K) + else: + K = K0 + + if K.is_ZZ: + levels, f, v = dmp_exclude(f, u, K) + coeff, factors = dmp_zz_factor(f, v, K) + + for i, (f, k) in enumerate(factors): + factors[i] = (dmp_include(f, levels, v, K), k) + elif K.is_Poly: + f, v = dmp_inject(f, u, K) + + coeff, factors = dmp_factor_list(f, v, K.dom) + + for i, (f, k) in enumerate(factors): + factors[i] = (dmp_eject(f, v, K), k) + + coeff = K.convert(coeff, K.dom) + else: # pragma: no cover + raise DomainError('factorization not supported over %s' % K0) + + if K0.is_Field: + for i, (f, k) in enumerate(factors): + factors[i] = (dmp_convert(f, u, K, K0), k) + + coeff = K0.convert(coeff, K) + coeff = K0.quo(coeff, denom) + + if K0_inexact: + for i, (f, k) in enumerate(factors): + max_norm = dmp_max_norm(f, u, K0) + f = dmp_quo_ground(f, max_norm, u, K0) + f = dmp_convert(f, u, K0, K0_inexact) + factors[i] = (f, k) + coeff = K0.mul(coeff, K0.pow(max_norm, k)) + + coeff = K0_inexact.convert(coeff, K0) + K0 = K0_inexact + + for i, j in enumerate(reversed(J)): + if not j: + continue + + term = {(0,)*(u - i) + (1,) + (0,)*i: K0.one} + factors.insert(0, (dmp_from_dict(term, u, K0), j)) + + return coeff*cont, _sort_factors(factors) + + +def dmp_factor_list_include(f, u, K): + """Factor multivariate polynomials into irreducibles in `K[X]`. """ + if not u: + return dup_factor_list_include(f, K) + + coeff, factors = dmp_factor_list(f, u, K) + + if not factors: + return [(dmp_ground(coeff, u), 1)] + else: + g = dmp_mul_ground(factors[0][0], coeff, u, K) + return [(g, factors[0][1])] + factors[1:] + + +def dup_irreducible_p(f, K): + """ + Returns ``True`` if a univariate polynomial ``f`` has no factors + over its domain. + """ + return dmp_irreducible_p(f, 0, K) + + +def dmp_irreducible_p(f, u, K): + """ + Returns ``True`` if a multivariate polynomial ``f`` has no factors + over its domain. + """ + _, factors = dmp_factor_list(f, u, K) + + if not factors: + return True + elif len(factors) > 1: + return False + else: + _, k = factors[0] + return k == 1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fglmtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fglmtools.py new file mode 100644 index 0000000000000000000000000000000000000000..d68fe5bc2a40741e39b89163d393f7b57e6b1c49 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fglmtools.py @@ -0,0 +1,153 @@ +"""Implementation of matrix FGLM Groebner basis conversion algorithm. """ + + +from sympy.polys.monomials import monomial_mul, monomial_div + +def matrix_fglm(F, ring, O_to): + """ + Converts the reduced Groebner basis ``F`` of a zero-dimensional + ideal w.r.t. ``O_from`` to a reduced Groebner basis + w.r.t. ``O_to``. + + References + ========== + + .. [1] J.C. Faugere, P. Gianni, D. Lazard, T. Mora (1994). Efficient + Computation of Zero-dimensional Groebner Bases by Change of + Ordering + """ + domain = ring.domain + ngens = ring.ngens + + ring_to = ring.clone(order=O_to) + + old_basis = _basis(F, ring) + M = _representing_matrices(old_basis, F, ring) + + # V contains the normalforms (wrt O_from) of S + S = [ring.zero_monom] + V = [[domain.one] + [domain.zero] * (len(old_basis) - 1)] + G = [] + + L = [(i, 0) for i in range(ngens)] # (i, j) corresponds to x_i * S[j] + L.sort(key=lambda k_l: O_to(_incr_k(S[k_l[1]], k_l[0])), reverse=True) + t = L.pop() + + P = _identity_matrix(len(old_basis), domain) + + while True: + s = len(S) + v = _matrix_mul(M[t[0]], V[t[1]]) + _lambda = _matrix_mul(P, v) + + if all(_lambda[i] == domain.zero for i in range(s, len(old_basis))): + # there is a linear combination of v by V + lt = ring.term_new(_incr_k(S[t[1]], t[0]), domain.one) + rest = ring.from_dict({S[i]: _lambda[i] for i in range(s)}) + + g = (lt - rest).set_ring(ring_to) + if g: + G.append(g) + else: + # v is linearly independent from V + P = _update(s, _lambda, P) + S.append(_incr_k(S[t[1]], t[0])) + V.append(v) + + L.extend([(i, s) for i in range(ngens)]) + L = list(set(L)) + L.sort(key=lambda k_l: O_to(_incr_k(S[k_l[1]], k_l[0])), reverse=True) + + L = [(k, l) for (k, l) in L if all(monomial_div(_incr_k(S[l], k), g.LM) is None for g in G)] + + if not L: + G = [ g.monic() for g in G ] + return sorted(G, key=lambda g: O_to(g.LM), reverse=True) + + t = L.pop() + + +def _incr_k(m, k): + return tuple(list(m[:k]) + [m[k] + 1] + list(m[k + 1:])) + + +def _identity_matrix(n, domain): + M = [[domain.zero]*n for _ in range(n)] + + for i in range(n): + M[i][i] = domain.one + + return M + + +def _matrix_mul(M, v): + return [sum(row[i] * v[i] for i in range(len(v))) for row in M] + + +def _update(s, _lambda, P): + """ + Update ``P`` such that for the updated `P'` `P' v = e_{s}`. + """ + k = min(j for j in range(s, len(_lambda)) if _lambda[j] != 0) + + for r in range(len(_lambda)): + if r != k: + P[r] = [P[r][j] - (P[k][j] * _lambda[r]) / _lambda[k] for j in range(len(P[r]))] + + P[k] = [P[k][j] / _lambda[k] for j in range(len(P[k]))] + P[k], P[s] = P[s], P[k] + + return P + + +def _representing_matrices(basis, G, ring): + r""" + Compute the matrices corresponding to the linear maps `m \mapsto + x_i m` for all variables `x_i`. + """ + domain = ring.domain + u = ring.ngens-1 + + def var(i): + return tuple([0] * i + [1] + [0] * (u - i)) + + def representing_matrix(m): + M = [[domain.zero] * len(basis) for _ in range(len(basis))] + + for i, v in enumerate(basis): + r = ring.term_new(monomial_mul(m, v), domain.one).rem(G) + + for monom, coeff in r.terms(): + j = basis.index(monom) + M[j][i] = coeff + + return M + + return [representing_matrix(var(i)) for i in range(u + 1)] + + +def _basis(G, ring): + r""" + Computes a list of monomials which are not divisible by the leading + monomials wrt to ``O`` of ``G``. These monomials are a basis of + `K[X_1, \ldots, X_n]/(G)`. + """ + order = ring.order + + leading_monomials = [g.LM for g in G] + candidates = [ring.zero_monom] + basis = [] + + while candidates: + t = candidates.pop() + basis.append(t) + + new_candidates = [_incr_k(t, k) for k in range(ring.ngens) + if all(monomial_div(_incr_k(t, k), lmg) is None + for lmg in leading_monomials)] + candidates.extend(new_candidates) + candidates.sort(key=order, reverse=True) + + basis = list(set(basis)) + + return sorted(basis, key=order) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fields.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fields.py new file mode 100644 index 0000000000000000000000000000000000000000..ee844df55690af0b140132249990b335d926b6d4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/fields.py @@ -0,0 +1,639 @@ +"""Sparse rational function fields. """ + +from __future__ import annotations +from functools import reduce + +from operator import add, mul, lt, le, gt, ge + +from sympy.core.expr import Expr +from sympy.core.mod import Mod +from sympy.core.numbers import Exp1 +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import CantSympify, sympify +from sympy.functions.elementary.exponential import ExpBase +from sympy.polys.domains.domain import Domain +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.domains.fractionfield import FractionField +from sympy.polys.domains.polynomialring import PolynomialRing +from sympy.polys.constructor import construct_domain +from sympy.polys.orderings import lex, MonomialOrder +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.polyoptions import build_options +from sympy.polys.polyutils import _parallel_dict_from_expr +from sympy.polys.rings import PolyRing, PolyElement +from sympy.printing.defaults import DefaultPrinting +from sympy.utilities import public +from sympy.utilities.iterables import is_sequence +from sympy.utilities.magic import pollute + +@public +def field(symbols, domain, order=lex): + """Construct new rational function field returning (field, x1, ..., xn). """ + _field = FracField(symbols, domain, order) + return (_field,) + _field.gens + +@public +def xfield(symbols, domain, order=lex): + """Construct new rational function field returning (field, (x1, ..., xn)). """ + _field = FracField(symbols, domain, order) + return (_field, _field.gens) + +@public +def vfield(symbols, domain, order=lex): + """Construct new rational function field and inject generators into global namespace. """ + _field = FracField(symbols, domain, order) + pollute([ sym.name for sym in _field.symbols ], _field.gens) + return _field + +@public +def sfield(exprs, *symbols, **options): + """Construct a field deriving generators and domain + from options and input expressions. + + Parameters + ========== + + exprs : py:class:`~.Expr` or sequence of :py:class:`~.Expr` (sympifiable) + + symbols : sequence of :py:class:`~.Symbol`/:py:class:`~.Expr` + + options : keyword arguments understood by :py:class:`~.Options` + + Examples + ======== + + >>> from sympy import exp, log, symbols, sfield + + >>> x = symbols("x") + >>> K, f = sfield((x*log(x) + 4*x**2)*exp(1/x + log(x)/3)/x**2) + >>> K + Rational function field in x, exp(1/x), log(x), x**(1/3) over ZZ with lex order + >>> f + (4*x**2*(exp(1/x)) + x*(exp(1/x))*(log(x)))/((x**(1/3))**5) + """ + single = False + if not is_sequence(exprs): + exprs, single = [exprs], True + + exprs = list(map(sympify, exprs)) + opt = build_options(symbols, options) + numdens = [] + for expr in exprs: + numdens.extend(expr.as_numer_denom()) + reps, opt = _parallel_dict_from_expr(numdens, opt) + + if opt.domain is None: + # NOTE: this is inefficient because construct_domain() automatically + # performs conversion to the target domain. It shouldn't do this. + coeffs = sum([list(rep.values()) for rep in reps], []) + opt.domain, _ = construct_domain(coeffs, opt=opt) + + _field = FracField(opt.gens, opt.domain, opt.order) + fracs = [] + for i in range(0, len(reps), 2): + fracs.append(_field(tuple(reps[i:i+2]))) + + if single: + return (_field, fracs[0]) + else: + return (_field, fracs) + + +class FracField(DefaultPrinting): + """Multivariate distributed rational function field. """ + + ring: PolyRing + gens: tuple[FracElement, ...] + symbols: tuple[Expr, ...] + ngens: int + domain: Domain + order: MonomialOrder + + def __new__(cls, symbols, domain, order=lex): + ring = PolyRing(symbols, domain, order) + symbols = ring.symbols + ngens = ring.ngens + domain = ring.domain + order = ring.order + + _hash_tuple = (cls.__name__, symbols, ngens, domain, order) + + obj = object.__new__(cls) + obj._hash_tuple = _hash_tuple + obj._hash = hash(_hash_tuple) + obj.ring = ring + obj.symbols = symbols + obj.ngens = ngens + obj.domain = domain + obj.order = order + + obj.dtype = FracElement(obj, ring.zero).raw_new + + obj.zero = obj.dtype(ring.zero) + obj.one = obj.dtype(ring.one) + + obj.gens = obj._gens() + + for symbol, generator in zip(obj.symbols, obj.gens): + if isinstance(symbol, Symbol): + name = symbol.name + + if not hasattr(obj, name): + setattr(obj, name, generator) + + return obj + + def _gens(self): + """Return a list of polynomial generators. """ + return tuple([ self.dtype(gen) for gen in self.ring.gens ]) + + def __getnewargs__(self): + return (self.symbols, self.domain, self.order) + + def __hash__(self): + return self._hash + + def index(self, gen): + if self.is_element(gen): + return self.ring.index(gen.to_poly()) + else: + raise ValueError("expected a %s, got %s instead" % (self.dtype,gen)) + + def __eq__(self, other): + return isinstance(other, FracField) and \ + (self.symbols, self.ngens, self.domain, self.order) == \ + (other.symbols, other.ngens, other.domain, other.order) + + def __ne__(self, other): + return not self == other + + def is_element(self, element): + """True if ``element`` is an element of this field. False otherwise. """ + return isinstance(element, FracElement) and element.field == self + + def raw_new(self, numer, denom=None): + return self.dtype(numer, denom) + + def new(self, numer, denom=None): + if denom is None: denom = self.ring.one + numer, denom = numer.cancel(denom) + return self.raw_new(numer, denom) + + def domain_new(self, element): + return self.domain.convert(element) + + def ground_new(self, element): + try: + return self.new(self.ring.ground_new(element)) + except CoercionFailed: + domain = self.domain + + if not domain.is_Field and domain.has_assoc_Field: + ring = self.ring + ground_field = domain.get_field() + element = ground_field.convert(element) + numer = ring.ground_new(ground_field.numer(element)) + denom = ring.ground_new(ground_field.denom(element)) + return self.raw_new(numer, denom) + else: + raise + + def field_new(self, element): + if isinstance(element, FracElement): + if self == element.field: + return element + + if isinstance(self.domain, FractionField) and \ + self.domain.field == element.field: + return self.ground_new(element) + elif isinstance(self.domain, PolynomialRing) and \ + self.domain.ring.to_field() == element.field: + return self.ground_new(element) + else: + raise NotImplementedError("conversion") + elif isinstance(element, PolyElement): + denom, numer = element.clear_denoms() + + if isinstance(self.domain, PolynomialRing) and \ + numer.ring == self.domain.ring: + numer = self.ring.ground_new(numer) + elif isinstance(self.domain, FractionField) and \ + numer.ring == self.domain.field.to_ring(): + numer = self.ring.ground_new(numer) + else: + numer = numer.set_ring(self.ring) + + denom = self.ring.ground_new(denom) + return self.raw_new(numer, denom) + elif isinstance(element, tuple) and len(element) == 2: + numer, denom = list(map(self.ring.ring_new, element)) + return self.new(numer, denom) + elif isinstance(element, str): + raise NotImplementedError("parsing") + elif isinstance(element, Expr): + return self.from_expr(element) + else: + return self.ground_new(element) + + __call__ = field_new + + def _rebuild_expr(self, expr, mapping): + domain = self.domain + powers = tuple((gen, gen.as_base_exp()) for gen in mapping.keys() + if gen.is_Pow or isinstance(gen, ExpBase)) + + def _rebuild(expr): + generator = mapping.get(expr) + + if generator is not None: + return generator + elif expr.is_Add: + return reduce(add, list(map(_rebuild, expr.args))) + elif expr.is_Mul: + return reduce(mul, list(map(_rebuild, expr.args))) + elif expr.is_Pow or isinstance(expr, (ExpBase, Exp1)): + b, e = expr.as_base_exp() + # look for bg**eg whose integer power may be b**e + for gen, (bg, eg) in powers: + if bg == b and Mod(e, eg) == 0: + return mapping.get(gen)**int(e/eg) + if e.is_Integer and e is not S.One: + return _rebuild(b)**int(e) + elif mapping.get(1/expr) is not None: + return 1/mapping.get(1/expr) + + try: + return domain.convert(expr) + except CoercionFailed: + if not domain.is_Field and domain.has_assoc_Field: + return domain.get_field().convert(expr) + else: + raise + + return _rebuild(expr) + + def from_expr(self, expr): + mapping = dict(list(zip(self.symbols, self.gens))) + + try: + frac = self._rebuild_expr(sympify(expr), mapping) + except CoercionFailed: + raise ValueError("expected an expression convertible to a rational function in %s, got %s" % (self, expr)) + else: + return self.field_new(frac) + + def to_domain(self): + return FractionField(self) + + def to_ring(self): + return PolyRing(self.symbols, self.domain, self.order) + +class FracElement(DomainElement, DefaultPrinting, CantSympify): + """Element of multivariate distributed rational function field. """ + + def __init__(self, field, numer, denom=None): + if denom is None: + denom = field.ring.one + elif not denom: + raise ZeroDivisionError("zero denominator") + + self.field = field + self.numer = numer + self.denom = denom + + def raw_new(f, numer, denom=None): + return f.__class__(f.field, numer, denom) + + def new(f, numer, denom): + return f.raw_new(*numer.cancel(denom)) + + def to_poly(f): + if f.denom != 1: + raise ValueError("f.denom should be 1") + return f.numer + + def parent(self): + return self.field.to_domain() + + def __getnewargs__(self): + return (self.field, self.numer, self.denom) + + _hash = None + + def __hash__(self): + _hash = self._hash + if _hash is None: + self._hash = _hash = hash((self.field, self.numer, self.denom)) + return _hash + + def copy(self): + return self.raw_new(self.numer.copy(), self.denom.copy()) + + def set_field(self, new_field): + if self.field == new_field: + return self + else: + new_ring = new_field.ring + numer = self.numer.set_ring(new_ring) + denom = self.denom.set_ring(new_ring) + return new_field.new(numer, denom) + + def as_expr(self, *symbols): + return self.numer.as_expr(*symbols)/self.denom.as_expr(*symbols) + + def __eq__(f, g): + if isinstance(g, FracElement) and f.field == g.field: + return f.numer == g.numer and f.denom == g.denom + else: + return f.numer == g and f.denom == f.field.ring.one + + def __ne__(f, g): + return not f == g + + def __bool__(f): + return bool(f.numer) + + def sort_key(self): + return (self.denom.sort_key(), self.numer.sort_key()) + + def _cmp(f1, f2, op): + if f1.field.is_element(f2): + return op(f1.sort_key(), f2.sort_key()) + else: + return NotImplemented + + def __lt__(f1, f2): + return f1._cmp(f2, lt) + def __le__(f1, f2): + return f1._cmp(f2, le) + def __gt__(f1, f2): + return f1._cmp(f2, gt) + def __ge__(f1, f2): + return f1._cmp(f2, ge) + + def __pos__(f): + """Negate all coefficients in ``f``. """ + return f.raw_new(f.numer, f.denom) + + def __neg__(f): + """Negate all coefficients in ``f``. """ + return f.raw_new(-f.numer, f.denom) + + def _extract_ground(self, element): + domain = self.field.domain + + try: + element = domain.convert(element) + except CoercionFailed: + if not domain.is_Field and domain.has_assoc_Field: + ground_field = domain.get_field() + + try: + element = ground_field.convert(element) + except CoercionFailed: + pass + else: + return -1, ground_field.numer(element), ground_field.denom(element) + + return 0, None, None + else: + return 1, element, None + + def __add__(f, g): + """Add rational functions ``f`` and ``g``. """ + field = f.field + + if not g: + return f + elif not f: + return g + elif field.is_element(g): + if f.denom == g.denom: + return f.new(f.numer + g.numer, f.denom) + else: + return f.new(f.numer*g.denom + f.denom*g.numer, f.denom*g.denom) + elif field.ring.is_element(g): + return f.new(f.numer + f.denom*g, f.denom) + else: + if isinstance(g, FracElement): + if isinstance(field.domain, FractionField) and field.domain.field == g.field: + pass + elif isinstance(g.field.domain, FractionField) and g.field.domain.field == field: + return g.__radd__(f) + else: + return NotImplemented + elif isinstance(g, PolyElement): + if isinstance(field.domain, PolynomialRing) and field.domain.ring == g.ring: + pass + else: + return g.__radd__(f) + + return f.__radd__(g) + + def __radd__(f, c): + if f.field.ring.is_element(c): + return f.new(f.numer + f.denom*c, f.denom) + + op, g_numer, g_denom = f._extract_ground(c) + + if op == 1: + return f.new(f.numer + f.denom*g_numer, f.denom) + elif not op: + return NotImplemented + else: + return f.new(f.numer*g_denom + f.denom*g_numer, f.denom*g_denom) + + def __sub__(f, g): + """Subtract rational functions ``f`` and ``g``. """ + field = f.field + + if not g: + return f + elif not f: + return -g + elif field.is_element(g): + if f.denom == g.denom: + return f.new(f.numer - g.numer, f.denom) + else: + return f.new(f.numer*g.denom - f.denom*g.numer, f.denom*g.denom) + elif field.ring.is_element(g): + return f.new(f.numer - f.denom*g, f.denom) + else: + if isinstance(g, FracElement): + if isinstance(field.domain, FractionField) and field.domain.field == g.field: + pass + elif isinstance(g.field.domain, FractionField) and g.field.domain.field == field: + return g.__rsub__(f) + else: + return NotImplemented + elif isinstance(g, PolyElement): + if isinstance(field.domain, PolynomialRing) and field.domain.ring == g.ring: + pass + else: + return g.__rsub__(f) + + op, g_numer, g_denom = f._extract_ground(g) + + if op == 1: + return f.new(f.numer - f.denom*g_numer, f.denom) + elif not op: + return NotImplemented + else: + return f.new(f.numer*g_denom - f.denom*g_numer, f.denom*g_denom) + + def __rsub__(f, c): + if f.field.ring.is_element(c): + return f.new(-f.numer + f.denom*c, f.denom) + + op, g_numer, g_denom = f._extract_ground(c) + + if op == 1: + return f.new(-f.numer + f.denom*g_numer, f.denom) + elif not op: + return NotImplemented + else: + return f.new(-f.numer*g_denom + f.denom*g_numer, f.denom*g_denom) + + def __mul__(f, g): + """Multiply rational functions ``f`` and ``g``. """ + field = f.field + + if not f or not g: + return field.zero + elif field.is_element(g): + return f.new(f.numer*g.numer, f.denom*g.denom) + elif field.ring.is_element(g): + return f.new(f.numer*g, f.denom) + else: + if isinstance(g, FracElement): + if isinstance(field.domain, FractionField) and field.domain.field == g.field: + pass + elif isinstance(g.field.domain, FractionField) and g.field.domain.field == field: + return g.__rmul__(f) + else: + return NotImplemented + elif isinstance(g, PolyElement): + if isinstance(field.domain, PolynomialRing) and field.domain.ring == g.ring: + pass + else: + return g.__rmul__(f) + + return f.__rmul__(g) + + def __rmul__(f, c): + if f.field.ring.is_element(c): + return f.new(f.numer*c, f.denom) + + op, g_numer, g_denom = f._extract_ground(c) + + if op == 1: + return f.new(f.numer*g_numer, f.denom) + elif not op: + return NotImplemented + else: + return f.new(f.numer*g_numer, f.denom*g_denom) + + def __truediv__(f, g): + """Computes quotient of fractions ``f`` and ``g``. """ + field = f.field + + if not g: + raise ZeroDivisionError + elif field.is_element(g): + return f.new(f.numer*g.denom, f.denom*g.numer) + elif field.ring.is_element(g): + return f.new(f.numer, f.denom*g) + else: + if isinstance(g, FracElement): + if isinstance(field.domain, FractionField) and field.domain.field == g.field: + pass + elif isinstance(g.field.domain, FractionField) and g.field.domain.field == field: + return g.__rtruediv__(f) + else: + return NotImplemented + elif isinstance(g, PolyElement): + if isinstance(field.domain, PolynomialRing) and field.domain.ring == g.ring: + pass + else: + return g.__rtruediv__(f) + + op, g_numer, g_denom = f._extract_ground(g) + + if op == 1: + return f.new(f.numer, f.denom*g_numer) + elif not op: + return NotImplemented + else: + return f.new(f.numer*g_denom, f.denom*g_numer) + + def __rtruediv__(f, c): + if not f: + raise ZeroDivisionError + elif f.field.ring.is_element(c): + return f.new(f.denom*c, f.numer) + + op, g_numer, g_denom = f._extract_ground(c) + + if op == 1: + return f.new(f.denom*g_numer, f.numer) + elif not op: + return NotImplemented + else: + return f.new(f.denom*g_numer, f.numer*g_denom) + + def __pow__(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + if n >= 0: + return f.raw_new(f.numer**n, f.denom**n) + elif not f: + raise ZeroDivisionError + else: + return f.raw_new(f.denom**-n, f.numer**-n) + + def diff(f, x): + """Computes partial derivative in ``x``. + + Examples + ======== + + >>> from sympy.polys.fields import field + >>> from sympy.polys.domains import ZZ + + >>> _, x, y, z = field("x,y,z", ZZ) + >>> ((x**2 + y)/(z + 1)).diff(x) + 2*x/(z + 1) + + """ + x = x.to_poly() + return f.new(f.numer.diff(x)*f.denom - f.numer*f.denom.diff(x), f.denom**2) + + def __call__(f, *values): + if 0 < len(values) <= f.field.ngens: + return f.evaluate(list(zip(f.field.gens, values))) + else: + raise ValueError("expected at least 1 and at most %s values, got %s" % (f.field.ngens, len(values))) + + def evaluate(f, x, a=None): + if isinstance(x, list) and a is None: + x = [ (X.to_poly(), a) for X, a in x ] + numer, denom = f.numer.evaluate(x), f.denom.evaluate(x) + else: + x = x.to_poly() + numer, denom = f.numer.evaluate(x, a), f.denom.evaluate(x, a) + + field = numer.ring.to_field() + return field.new(numer, denom) + + def subs(f, x, a=None): + if isinstance(x, list) and a is None: + x = [ (X.to_poly(), a) for X, a in x ] + numer, denom = f.numer.subs(x), f.denom.subs(x) + else: + x = x.to_poly() + numer, denom = f.numer.subs(x, a), f.denom.subs(x, a) + + return f.new(numer, denom) + + def compose(f, x, a=None): + raise NotImplementedError diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/galoistools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/galoistools.py new file mode 100644 index 0000000000000000000000000000000000000000..b09f85057eced59b8054c6007f2b291a35a2fafb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/galoistools.py @@ -0,0 +1,2532 @@ +"""Dense univariate polynomials with coefficients in Galois fields. """ + +from math import ceil as _ceil, sqrt as _sqrt, prod + +from sympy.core.random import uniform, _randint +from sympy.external.gmpy import SYMPY_INTS, MPZ, invert +from sympy.polys.polyconfig import query +from sympy.polys.polyerrors import ExactQuotientFailed +from sympy.polys.polyutils import _sort_factors + + +def gf_crt(U, M, K=None): + """ + Chinese Remainder Theorem. + + Given a set of integer residues ``u_0,...,u_n`` and a set of + co-prime integer moduli ``m_0,...,m_n``, returns an integer + ``u``, such that ``u = u_i mod m_i`` for ``i = ``0,...,n``. + + Examples + ======== + + Consider a set of residues ``U = [49, 76, 65]`` + and a set of moduli ``M = [99, 97, 95]``. Then we have:: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_crt + + >>> gf_crt([49, 76, 65], [99, 97, 95], ZZ) + 639985 + + This is the correct result because:: + + >>> [639985 % m for m in [99, 97, 95]] + [49, 76, 65] + + Note: this is a low-level routine with no error checking. + + See Also + ======== + + sympy.ntheory.modular.crt : a higher level crt routine + sympy.ntheory.modular.solve_congruence + + """ + p = prod(M, start=K.one) + v = K.zero + + for u, m in zip(U, M): + e = p // m + s, _, _ = K.gcdex(e, m) + v += e*(u*s % m) + + return v % p + + +def gf_crt1(M, K): + """ + First part of the Chinese Remainder Theorem. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_crt, gf_crt1, gf_crt2 + >>> U = [49, 76, 65] + >>> M = [99, 97, 95] + + The following two codes have the same result. + + >>> gf_crt(U, M, ZZ) + 639985 + + >>> p, E, S = gf_crt1(M, ZZ) + >>> gf_crt2(U, M, p, E, S, ZZ) + 639985 + + However, it is faster when we want to fix ``M`` and + compute for multiple U, i.e. the following cases: + + >>> p, E, S = gf_crt1(M, ZZ) + >>> Us = [[49, 76, 65], [23, 42, 67]] + >>> for U in Us: + ... print(gf_crt2(U, M, p, E, S, ZZ)) + 639985 + 236237 + + See Also + ======== + + sympy.ntheory.modular.crt1 : a higher level crt routine + sympy.polys.galoistools.gf_crt + sympy.polys.galoistools.gf_crt2 + + """ + E, S = [], [] + p = prod(M, start=K.one) + + for m in M: + E.append(p // m) + S.append(K.gcdex(E[-1], m)[0] % m) + + return p, E, S + + +def gf_crt2(U, M, p, E, S, K): + """ + Second part of the Chinese Remainder Theorem. + + See ``gf_crt1`` for usage. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_crt2 + + >>> U = [49, 76, 65] + >>> M = [99, 97, 95] + >>> p = 912285 + >>> E = [9215, 9405, 9603] + >>> S = [62, 24, 12] + + >>> gf_crt2(U, M, p, E, S, ZZ) + 639985 + + See Also + ======== + + sympy.ntheory.modular.crt2 : a higher level crt routine + sympy.polys.galoistools.gf_crt + sympy.polys.galoistools.gf_crt1 + + """ + v = K.zero + + for u, m, e, s in zip(U, M, E, S): + v += e*(u*s % m) + + return v % p + + +def gf_int(a, p): + """ + Coerce ``a mod p`` to an integer in the range ``[-p/2, p/2]``. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_int + + >>> gf_int(2, 7) + 2 + >>> gf_int(5, 7) + -2 + + """ + if a <= p // 2: + return a + else: + return a - p + + +def gf_degree(f): + """ + Return the leading degree of ``f``. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_degree + + >>> gf_degree([1, 1, 2, 0]) + 3 + >>> gf_degree([]) + -1 + + """ + return len(f) - 1 + + +def gf_LC(f, K): + """ + Return the leading coefficient of ``f``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_LC + + >>> gf_LC([3, 0, 1], ZZ) + 3 + + """ + if not f: + return K.zero + else: + return f[0] + + +def gf_TC(f, K): + """ + Return the trailing coefficient of ``f``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_TC + + >>> gf_TC([3, 0, 1], ZZ) + 1 + + """ + if not f: + return K.zero + else: + return f[-1] + + +def gf_strip(f): + """ + Remove leading zeros from ``f``. + + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_strip + + >>> gf_strip([0, 0, 0, 3, 0, 1]) + [3, 0, 1] + + """ + if not f or f[0]: + return f + + k = 0 + + for coeff in f: + if coeff: + break + else: + k += 1 + + return f[k:] + + +def gf_trunc(f, p): + """ + Reduce all coefficients modulo ``p``. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_trunc + + >>> gf_trunc([7, -2, 3], 5) + [2, 3, 3] + + """ + return gf_strip([ a % p for a in f ]) + + +def gf_normal(f, p, K): + """ + Normalize all coefficients in ``K``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_normal + + >>> gf_normal([5, 10, 21, -3], 5, ZZ) + [1, 2] + + """ + return gf_trunc(list(map(K, f)), p) + + +def gf_from_dict(f, p, K): + """ + Create a ``GF(p)[x]`` polynomial from a dict. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_from_dict + + >>> gf_from_dict({10: ZZ(4), 4: ZZ(33), 0: ZZ(-1)}, 5, ZZ) + [4, 0, 0, 0, 0, 0, 3, 0, 0, 0, 4] + + """ + n, h = max(f.keys()), [] + + if isinstance(n, SYMPY_INTS): + for k in range(n, -1, -1): + h.append(f.get(k, K.zero) % p) + else: + (n,) = n + + for k in range(n, -1, -1): + h.append(f.get((k,), K.zero) % p) + + return gf_trunc(h, p) + + +def gf_to_dict(f, p, symmetric=True): + """ + Convert a ``GF(p)[x]`` polynomial to a dict. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_to_dict + + >>> gf_to_dict([4, 0, 0, 0, 0, 0, 3, 0, 0, 0, 4], 5) + {0: -1, 4: -2, 10: -1} + >>> gf_to_dict([4, 0, 0, 0, 0, 0, 3, 0, 0, 0, 4], 5, symmetric=False) + {0: 4, 4: 3, 10: 4} + + """ + n, result = gf_degree(f), {} + + for k in range(0, n + 1): + if symmetric: + a = gf_int(f[n - k], p) + else: + a = f[n - k] + + if a: + result[k] = a + + return result + + +def gf_from_int_poly(f, p): + """ + Create a ``GF(p)[x]`` polynomial from ``Z[x]``. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_from_int_poly + + >>> gf_from_int_poly([7, -2, 3], 5) + [2, 3, 3] + + """ + return gf_trunc(f, p) + + +def gf_to_int_poly(f, p, symmetric=True): + """ + Convert a ``GF(p)[x]`` polynomial to ``Z[x]``. + + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_to_int_poly + + >>> gf_to_int_poly([2, 3, 3], 5) + [2, -2, -2] + >>> gf_to_int_poly([2, 3, 3], 5, symmetric=False) + [2, 3, 3] + + """ + if symmetric: + return [ gf_int(c, p) for c in f ] + else: + return f + + +def gf_neg(f, p, K): + """ + Negate a polynomial in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_neg + + >>> gf_neg([3, 2, 1, 0], 5, ZZ) + [2, 3, 4, 0] + + """ + return [ -coeff % p for coeff in f ] + + +def gf_add_ground(f, a, p, K): + """ + Compute ``f + a`` where ``f`` in ``GF(p)[x]`` and ``a`` in ``GF(p)``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_add_ground + + >>> gf_add_ground([3, 2, 4], 2, 5, ZZ) + [3, 2, 1] + + """ + if not f: + a = a % p + else: + a = (f[-1] + a) % p + + if len(f) > 1: + return f[:-1] + [a] + + if not a: + return [] + else: + return [a] + + +def gf_sub_ground(f, a, p, K): + """ + Compute ``f - a`` where ``f`` in ``GF(p)[x]`` and ``a`` in ``GF(p)``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sub_ground + + >>> gf_sub_ground([3, 2, 4], 2, 5, ZZ) + [3, 2, 2] + + """ + if not f: + a = -a % p + else: + a = (f[-1] - a) % p + + if len(f) > 1: + return f[:-1] + [a] + + if not a: + return [] + else: + return [a] + + +def gf_mul_ground(f, a, p, K): + """ + Compute ``f * a`` where ``f`` in ``GF(p)[x]`` and ``a`` in ``GF(p)``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_mul_ground + + >>> gf_mul_ground([3, 2, 4], 2, 5, ZZ) + [1, 4, 3] + + """ + if not a: + return [] + else: + return [ (a*b) % p for b in f ] + + +def gf_quo_ground(f, a, p, K): + """ + Compute ``f/a`` where ``f`` in ``GF(p)[x]`` and ``a`` in ``GF(p)``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_quo_ground + + >>> gf_quo_ground(ZZ.map([3, 2, 4]), ZZ(2), 5, ZZ) + [4, 1, 2] + + """ + return gf_mul_ground(f, K.invert(a, p), p, K) + + +def gf_add(f, g, p, K): + """ + Add polynomials in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_add + + >>> gf_add([3, 2, 4], [2, 2, 2], 5, ZZ) + [4, 1] + + """ + if not f: + return g + if not g: + return f + + df = gf_degree(f) + dg = gf_degree(g) + + if df == dg: + return gf_strip([ (a + b) % p for a, b in zip(f, g) ]) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = g[:k], g[k:] + + return h + [ (a + b) % p for a, b in zip(f, g) ] + + +def gf_sub(f, g, p, K): + """ + Subtract polynomials in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sub + + >>> gf_sub([3, 2, 4], [2, 2, 2], 5, ZZ) + [1, 0, 2] + + """ + if not g: + return f + if not f: + return gf_neg(g, p, K) + + df = gf_degree(f) + dg = gf_degree(g) + + if df == dg: + return gf_strip([ (a - b) % p for a, b in zip(f, g) ]) + else: + k = abs(df - dg) + + if df > dg: + h, f = f[:k], f[k:] + else: + h, g = gf_neg(g[:k], p, K), g[k:] + + return h + [ (a - b) % p for a, b in zip(f, g) ] + + +def gf_mul(f, g, p, K): + """ + Multiply polynomials in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_mul + + >>> gf_mul([3, 2, 4], [2, 2, 2], 5, ZZ) + [1, 0, 3, 2, 3] + + """ + df = gf_degree(f) + dg = gf_degree(g) + + dh = df + dg + h = [0]*(dh + 1) + + for i in range(0, dh + 1): + coeff = K.zero + + for j in range(max(0, i - dg), min(i, df) + 1): + coeff += f[j]*g[i - j] + + h[i] = coeff % p + + return gf_strip(h) + + +def gf_sqr(f, p, K): + """ + Square polynomials in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sqr + + >>> gf_sqr([3, 2, 4], 5, ZZ) + [4, 2, 3, 1, 1] + + """ + df = gf_degree(f) + + dh = 2*df + h = [0]*(dh + 1) + + for i in range(0, dh + 1): + coeff = K.zero + + jmin = max(0, i - df) + jmax = min(i, df) + + n = jmax - jmin + 1 + + jmax = jmin + n // 2 - 1 + + for j in range(jmin, jmax + 1): + coeff += f[j]*f[i - j] + + coeff += coeff + + if n & 1: + elem = f[jmax + 1] + coeff += elem**2 + + h[i] = coeff % p + + return gf_strip(h) + + +def gf_add_mul(f, g, h, p, K): + """ + Returns ``f + g*h`` where ``f``, ``g``, ``h`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_add_mul + >>> gf_add_mul([3, 2, 4], [2, 2, 2], [1, 4], 5, ZZ) + [2, 3, 2, 2] + """ + return gf_add(f, gf_mul(g, h, p, K), p, K) + + +def gf_sub_mul(f, g, h, p, K): + """ + Compute ``f - g*h`` where ``f``, ``g``, ``h`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sub_mul + + >>> gf_sub_mul([3, 2, 4], [2, 2, 2], [1, 4], 5, ZZ) + [3, 3, 2, 1] + + """ + return gf_sub(f, gf_mul(g, h, p, K), p, K) + + +def gf_expand(F, p, K): + """ + Expand results of :func:`~.factor` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_expand + + >>> gf_expand([([3, 2, 4], 1), ([2, 2], 2), ([3, 1], 3)], 5, ZZ) + [4, 3, 0, 3, 0, 1, 4, 1] + + """ + if isinstance(F, tuple): + lc, F = F + else: + lc = K.one + + g = [lc] + + for f, k in F: + f = gf_pow(f, k, p, K) + g = gf_mul(g, f, p, K) + + return g + + +def gf_div(f, g, p, K): + """ + Division with remainder in ``GF(p)[x]``. + + Given univariate polynomials ``f`` and ``g`` with coefficients in a + finite field with ``p`` elements, returns polynomials ``q`` and ``r`` + (quotient and remainder) such that ``f = q*g + r``. + + Consider polynomials ``x**3 + x + 1`` and ``x**2 + x`` in GF(2):: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_div, gf_add_mul + + >>> gf_div(ZZ.map([1, 0, 1, 1]), ZZ.map([1, 1, 0]), 2, ZZ) + ([1, 1], [1]) + + As result we obtained quotient ``x + 1`` and remainder ``1``, thus:: + + >>> gf_add_mul(ZZ.map([1]), ZZ.map([1, 1]), ZZ.map([1, 1, 0]), 2, ZZ) + [1, 0, 1, 1] + + References + ========== + + .. [1] [Monagan93]_ + .. [2] [Gathen99]_ + + """ + df = gf_degree(f) + dg = gf_degree(g) + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return [], f + + inv = K.invert(g[0], p) + + h, dq, dr = list(f), df - dg, dg - 1 + + for i in range(0, df + 1): + coeff = h[i] + + for j in range(max(0, dg - i), min(df - i, dr) + 1): + coeff -= h[i + j - dg] * g[dg - j] + + if i <= dq: + coeff *= inv + + h[i] = coeff % p + + return h[:dq + 1], gf_strip(h[dq + 1:]) + + +def gf_rem(f, g, p, K): + """ + Compute polynomial remainder in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_rem + + >>> gf_rem(ZZ.map([1, 0, 1, 1]), ZZ.map([1, 1, 0]), 2, ZZ) + [1] + + """ + return gf_div(f, g, p, K)[1] + + +def gf_quo(f, g, p, K): + """ + Compute exact quotient in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_quo + + >>> gf_quo(ZZ.map([1, 0, 1, 1]), ZZ.map([1, 1, 0]), 2, ZZ) + [1, 1] + >>> gf_quo(ZZ.map([1, 0, 3, 2, 3]), ZZ.map([2, 2, 2]), 5, ZZ) + [3, 2, 4] + + """ + df = gf_degree(f) + dg = gf_degree(g) + + if not g: + raise ZeroDivisionError("polynomial division") + elif df < dg: + return [] + + inv = K.invert(g[0], p) + + h, dq, dr = f[:], df - dg, dg - 1 + + for i in range(0, dq + 1): + coeff = h[i] + + for j in range(max(0, dg - i), min(df - i, dr) + 1): + coeff -= h[i + j - dg] * g[dg - j] + + h[i] = (coeff * inv) % p + + return h[:dq + 1] + + +def gf_exquo(f, g, p, K): + """ + Compute polynomial quotient in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_exquo + + >>> gf_exquo(ZZ.map([1, 0, 3, 2, 3]), ZZ.map([2, 2, 2]), 5, ZZ) + [3, 2, 4] + + >>> gf_exquo(ZZ.map([1, 0, 1, 1]), ZZ.map([1, 1, 0]), 2, ZZ) + Traceback (most recent call last): + ... + ExactQuotientFailed: [1, 1, 0] does not divide [1, 0, 1, 1] + + """ + q, r = gf_div(f, g, p, K) + + if not r: + return q + else: + raise ExactQuotientFailed(f, g) + + +def gf_lshift(f, n, K): + """ + Efficiently multiply ``f`` by ``x**n``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_lshift + + >>> gf_lshift([3, 2, 4], 4, ZZ) + [3, 2, 4, 0, 0, 0, 0] + + """ + if not f: + return f + else: + return f + [K.zero]*n + + +def gf_rshift(f, n, K): + """ + Efficiently divide ``f`` by ``x**n``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_rshift + + >>> gf_rshift([1, 2, 3, 4, 0], 3, ZZ) + ([1, 2], [3, 4, 0]) + + """ + if not n: + return f, [] + else: + return f[:-n], f[-n:] + + +def gf_pow(f, n, p, K): + """ + Compute ``f**n`` in ``GF(p)[x]`` using repeated squaring. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_pow + + >>> gf_pow([3, 2, 4], 3, 5, ZZ) + [2, 4, 4, 2, 2, 1, 4] + + """ + if not n: + return [K.one] + elif n == 1: + return f + elif n == 2: + return gf_sqr(f, p, K) + + h = [K.one] + + while True: + if n & 1: + h = gf_mul(h, f, p, K) + n -= 1 + + n >>= 1 + + if not n: + break + + f = gf_sqr(f, p, K) + + return h + +def gf_frobenius_monomial_base(g, p, K): + """ + return the list of ``x**(i*p) mod g in Z_p`` for ``i = 0, .., n - 1`` + where ``n = gf_degree(g)`` + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_frobenius_monomial_base + >>> g = ZZ.map([1, 0, 2, 1]) + >>> gf_frobenius_monomial_base(g, 5, ZZ) + [[1], [4, 4, 2], [1, 2]] + + """ + n = gf_degree(g) + if n == 0: + return [] + b = [0]*n + b[0] = [1] + if p < n: + for i in range(1, n): + mon = gf_lshift(b[i - 1], p, K) + b[i] = gf_rem(mon, g, p, K) + elif n > 1: + b[1] = gf_pow_mod([K.one, K.zero], p, g, p, K) + for i in range(2, n): + b[i] = gf_mul(b[i - 1], b[1], p, K) + b[i] = gf_rem(b[i], g, p, K) + + return b + +def gf_frobenius_map(f, g, b, p, K): + """ + compute gf_pow_mod(f, p, g, p, K) using the Frobenius map + + Parameters + ========== + + f, g : polynomials in ``GF(p)[x]`` + b : frobenius monomial base + p : prime number + K : domain + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_frobenius_monomial_base, gf_frobenius_map + >>> f = ZZ.map([2, 1, 0, 1]) + >>> g = ZZ.map([1, 0, 2, 1]) + >>> p = 5 + >>> b = gf_frobenius_monomial_base(g, p, ZZ) + >>> r = gf_frobenius_map(f, g, b, p, ZZ) + >>> gf_frobenius_map(f, g, b, p, ZZ) + [4, 0, 3] + """ + m = gf_degree(g) + if gf_degree(f) >= m: + f = gf_rem(f, g, p, K) + if not f: + return [] + n = gf_degree(f) + sf = [f[-1]] + for i in range(1, n + 1): + v = gf_mul_ground(b[i], f[n - i], p, K) + sf = gf_add(sf, v, p, K) + return sf + +def _gf_pow_pnm1d2(f, n, g, b, p, K): + """ + utility function for ``gf_edf_zassenhaus`` + Compute ``f**((p**n - 1) // 2)`` in ``GF(p)[x]/(g)`` + ``f**((p**n - 1) // 2) = (f*f**p*...*f**(p**n - 1))**((p - 1) // 2)`` + """ + f = gf_rem(f, g, p, K) + h = f + r = f + for i in range(1, n): + h = gf_frobenius_map(h, g, b, p, K) + r = gf_mul(r, h, p, K) + r = gf_rem(r, g, p, K) + + res = gf_pow_mod(r, (p - 1)//2, g, p, K) + return res + +def gf_pow_mod(f, n, g, p, K): + """ + Compute ``f**n`` in ``GF(p)[x]/(g)`` using repeated squaring. + + Given polynomials ``f`` and ``g`` in ``GF(p)[x]`` and a non-negative + integer ``n``, efficiently computes ``f**n (mod g)`` i.e. the remainder + of ``f**n`` from division by ``g``, using the repeated squaring algorithm. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_pow_mod + + >>> gf_pow_mod(ZZ.map([3, 2, 4]), 3, ZZ.map([1, 1]), 5, ZZ) + [] + + References + ========== + + .. [1] [Gathen99]_ + + """ + if not n: + return [K.one] + elif n == 1: + return gf_rem(f, g, p, K) + elif n == 2: + return gf_rem(gf_sqr(f, p, K), g, p, K) + + h = [K.one] + + while True: + if n & 1: + h = gf_mul(h, f, p, K) + h = gf_rem(h, g, p, K) + n -= 1 + + n >>= 1 + + if not n: + break + + f = gf_sqr(f, p, K) + f = gf_rem(f, g, p, K) + + return h + + +def gf_gcd(f, g, p, K): + """ + Euclidean Algorithm in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_gcd + + >>> gf_gcd(ZZ.map([3, 2, 4]), ZZ.map([2, 2, 3]), 5, ZZ) + [1, 3] + + """ + while g: + f, g = g, gf_rem(f, g, p, K) + + return gf_monic(f, p, K)[1] + + +def gf_lcm(f, g, p, K): + """ + Compute polynomial LCM in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_lcm + + >>> gf_lcm(ZZ.map([3, 2, 4]), ZZ.map([2, 2, 3]), 5, ZZ) + [1, 2, 0, 4] + + """ + if not f or not g: + return [] + + h = gf_quo(gf_mul(f, g, p, K), + gf_gcd(f, g, p, K), p, K) + + return gf_monic(h, p, K)[1] + + +def gf_cofactors(f, g, p, K): + """ + Compute polynomial GCD and cofactors in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_cofactors + + >>> gf_cofactors(ZZ.map([3, 2, 4]), ZZ.map([2, 2, 3]), 5, ZZ) + ([1, 3], [3, 3], [2, 1]) + + """ + if not f and not g: + return ([], [], []) + + h = gf_gcd(f, g, p, K) + + return (h, gf_quo(f, h, p, K), + gf_quo(g, h, p, K)) + + +def gf_gcdex(f, g, p, K): + """ + Extended Euclidean Algorithm in ``GF(p)[x]``. + + Given polynomials ``f`` and ``g`` in ``GF(p)[x]``, computes polynomials + ``s``, ``t`` and ``h``, such that ``h = gcd(f, g)`` and ``s*f + t*g = h``. + The typical application of EEA is solving polynomial diophantine equations. + + Consider polynomials ``f = (x + 7) (x + 1)``, ``g = (x + 7) (x**2 + 1)`` + in ``GF(11)[x]``. Application of Extended Euclidean Algorithm gives:: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_gcdex, gf_mul, gf_add + + >>> s, t, g = gf_gcdex(ZZ.map([1, 8, 7]), ZZ.map([1, 7, 1, 7]), 11, ZZ) + >>> s, t, g + ([5, 6], [6], [1, 7]) + + As result we obtained polynomials ``s = 5*x + 6`` and ``t = 6``, and + additionally ``gcd(f, g) = x + 7``. This is correct because:: + + >>> S = gf_mul(s, ZZ.map([1, 8, 7]), 11, ZZ) + >>> T = gf_mul(t, ZZ.map([1, 7, 1, 7]), 11, ZZ) + + >>> gf_add(S, T, 11, ZZ) == [1, 7] + True + + References + ========== + + .. [1] [Gathen99]_ + + """ + if not (f or g): + return [K.one], [], [] + + p0, r0 = gf_monic(f, p, K) + p1, r1 = gf_monic(g, p, K) + + if not f: + return [], [K.invert(p1, p)], r1 + if not g: + return [K.invert(p0, p)], [], r0 + + s0, s1 = [K.invert(p0, p)], [] + t0, t1 = [], [K.invert(p1, p)] + + while True: + Q, R = gf_div(r0, r1, p, K) + + if not R: + break + + (lc, r1), r0 = gf_monic(R, p, K), r1 + + inv = K.invert(lc, p) + + s = gf_sub_mul(s0, s1, Q, p, K) + t = gf_sub_mul(t0, t1, Q, p, K) + + s1, s0 = gf_mul_ground(s, inv, p, K), s1 + t1, t0 = gf_mul_ground(t, inv, p, K), t1 + + return s1, t1, r1 + + +def gf_monic(f, p, K): + """ + Compute LC and a monic polynomial in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_monic + + >>> gf_monic(ZZ.map([3, 2, 4]), 5, ZZ) + (3, [1, 4, 3]) + + """ + if not f: + return K.zero, [] + else: + lc = f[0] + + if K.is_one(lc): + return lc, list(f) + else: + return lc, gf_quo_ground(f, lc, p, K) + + +def gf_diff(f, p, K): + """ + Differentiate polynomial in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_diff + + >>> gf_diff([3, 2, 4], 5, ZZ) + [1, 2] + + """ + df = gf_degree(f) + + h, n = [K.zero]*df, df + + for coeff in f[:-1]: + coeff *= K(n) + coeff %= p + + if coeff: + h[df - n] = coeff + + n -= 1 + + return gf_strip(h) + + +def gf_eval(f, a, p, K): + """ + Evaluate ``f(a)`` in ``GF(p)`` using Horner scheme. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_eval + + >>> gf_eval([3, 2, 4], 2, 5, ZZ) + 0 + + """ + result = K.zero + + for c in f: + result *= a + result += c + result %= p + + return result + + +def gf_multi_eval(f, A, p, K): + """ + Evaluate ``f(a)`` for ``a`` in ``[a_1, ..., a_n]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_multi_eval + + >>> gf_multi_eval([3, 2, 4], [0, 1, 2, 3, 4], 5, ZZ) + [4, 4, 0, 2, 0] + + """ + return [ gf_eval(f, a, p, K) for a in A ] + + +def gf_compose(f, g, p, K): + """ + Compute polynomial composition ``f(g)`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_compose + + >>> gf_compose([3, 2, 4], [2, 2, 2], 5, ZZ) + [2, 4, 0, 3, 0] + + """ + if len(g) <= 1: + return gf_strip([gf_eval(f, gf_LC(g, K), p, K)]) + + if not f: + return [] + + h = [f[0]] + + for c in f[1:]: + h = gf_mul(h, g, p, K) + h = gf_add_ground(h, c, p, K) + + return h + + +def gf_compose_mod(g, h, f, p, K): + """ + Compute polynomial composition ``g(h)`` in ``GF(p)[x]/(f)``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_compose_mod + + >>> gf_compose_mod(ZZ.map([3, 2, 4]), ZZ.map([2, 2, 2]), ZZ.map([4, 3]), 5, ZZ) + [4] + + """ + if not g: + return [] + + comp = [g[0]] + + for a in g[1:]: + comp = gf_mul(comp, h, p, K) + comp = gf_add_ground(comp, a, p, K) + comp = gf_rem(comp, f, p, K) + + return comp + + +def gf_trace_map(a, b, c, n, f, p, K): + """ + Compute polynomial trace map in ``GF(p)[x]/(f)``. + + Given a polynomial ``f`` in ``GF(p)[x]``, polynomials ``a``, ``b``, + ``c`` in the quotient ring ``GF(p)[x]/(f)`` such that ``b = c**t + (mod f)`` for some positive power ``t`` of ``p``, and a positive + integer ``n``, returns a mapping:: + + a -> a**t**n, a + a**t + a**t**2 + ... + a**t**n (mod f) + + In factorization context, ``b = x**p mod f`` and ``c = x mod f``. + This way we can efficiently compute trace polynomials in equal + degree factorization routine, much faster than with other methods, + like iterated Frobenius algorithm, for large degrees. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_trace_map + + >>> gf_trace_map([1, 2], [4, 4], [1, 1], 4, [3, 2, 4], 5, ZZ) + ([1, 3], [1, 3]) + + References + ========== + + .. [1] [Gathen92]_ + + """ + u = gf_compose_mod(a, b, f, p, K) + v = b + + if n & 1: + U = gf_add(a, u, p, K) + V = b + else: + U = a + V = c + + n >>= 1 + + while n: + u = gf_add(u, gf_compose_mod(u, v, f, p, K), p, K) + v = gf_compose_mod(v, v, f, p, K) + + if n & 1: + U = gf_add(U, gf_compose_mod(u, V, f, p, K), p, K) + V = gf_compose_mod(v, V, f, p, K) + + n >>= 1 + + return gf_compose_mod(a, V, f, p, K), U + +def _gf_trace_map(f, n, g, b, p, K): + """ + utility for ``gf_edf_shoup`` + """ + f = gf_rem(f, g, p, K) + h = f + r = f + for i in range(1, n): + h = gf_frobenius_map(h, g, b, p, K) + r = gf_add(r, h, p, K) + r = gf_rem(r, g, p, K) + return r + + +def gf_random(n, p, K): + """ + Generate a random polynomial in ``GF(p)[x]`` of degree ``n``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_random + >>> gf_random(10, 5, ZZ) #doctest: +SKIP + [1, 2, 3, 2, 1, 1, 1, 2, 0, 4, 2] + + """ + pi = int(p) + return [K.one] + [ K(int(uniform(0, pi))) for i in range(0, n) ] + + +def gf_irreducible(n, p, K): + """ + Generate random irreducible polynomial of degree ``n`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_irreducible + >>> gf_irreducible(10, 5, ZZ) #doctest: +SKIP + [1, 4, 2, 2, 3, 2, 4, 1, 4, 0, 4] + + """ + while True: + f = gf_random(n, p, K) + if gf_irreducible_p(f, p, K): + return f + + +def gf_irred_p_ben_or(f, p, K): + """ + Ben-Or's polynomial irreducibility test over finite fields. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_irred_p_ben_or + + >>> gf_irred_p_ben_or(ZZ.map([1, 4, 2, 2, 3, 2, 4, 1, 4, 0, 4]), 5, ZZ) + True + >>> gf_irred_p_ben_or(ZZ.map([3, 2, 4]), 5, ZZ) + False + + """ + n = gf_degree(f) + + if n <= 1: + return True + + _, f = gf_monic(f, p, K) + if n < 5: + H = h = gf_pow_mod([K.one, K.zero], p, f, p, K) + + for i in range(0, n//2): + g = gf_sub(h, [K.one, K.zero], p, K) + + if gf_gcd(f, g, p, K) == [K.one]: + h = gf_compose_mod(h, H, f, p, K) + else: + return False + else: + b = gf_frobenius_monomial_base(f, p, K) + H = h = gf_frobenius_map([K.one, K.zero], f, b, p, K) + for i in range(0, n//2): + g = gf_sub(h, [K.one, K.zero], p, K) + if gf_gcd(f, g, p, K) == [K.one]: + h = gf_frobenius_map(h, f, b, p, K) + else: + return False + + return True + + +def gf_irred_p_rabin(f, p, K): + """ + Rabin's polynomial irreducibility test over finite fields. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_irred_p_rabin + + >>> gf_irred_p_rabin(ZZ.map([1, 4, 2, 2, 3, 2, 4, 1, 4, 0, 4]), 5, ZZ) + True + >>> gf_irred_p_rabin(ZZ.map([3, 2, 4]), 5, ZZ) + False + + """ + n = gf_degree(f) + + if n <= 1: + return True + + _, f = gf_monic(f, p, K) + + x = [K.one, K.zero] + + from sympy.ntheory import factorint + + indices = { n//d for d in factorint(n) } + + b = gf_frobenius_monomial_base(f, p, K) + h = b[1] + + for i in range(1, n): + if i in indices: + g = gf_sub(h, x, p, K) + + if gf_gcd(f, g, p, K) != [K.one]: + return False + + h = gf_frobenius_map(h, f, b, p, K) + + return h == x + +_irred_methods = { + 'ben-or': gf_irred_p_ben_or, + 'rabin': gf_irred_p_rabin, +} + + +def gf_irreducible_p(f, p, K): + """ + Test irreducibility of a polynomial ``f`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_irreducible_p + + >>> gf_irreducible_p(ZZ.map([1, 4, 2, 2, 3, 2, 4, 1, 4, 0, 4]), 5, ZZ) + True + >>> gf_irreducible_p(ZZ.map([3, 2, 4]), 5, ZZ) + False + + """ + method = query('GF_IRRED_METHOD') + + if method is not None: + irred = _irred_methods[method](f, p, K) + else: + irred = gf_irred_p_rabin(f, p, K) + + return irred + + +def gf_sqf_p(f, p, K): + """ + Return ``True`` if ``f`` is square-free in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sqf_p + + >>> gf_sqf_p(ZZ.map([3, 2, 4]), 5, ZZ) + True + >>> gf_sqf_p(ZZ.map([2, 4, 4, 2, 2, 1, 4]), 5, ZZ) + False + + """ + _, f = gf_monic(f, p, K) + + if not f: + return True + else: + return gf_gcd(f, gf_diff(f, p, K), p, K) == [K.one] + + +def gf_sqf_part(f, p, K): + """ + Return square-free part of a ``GF(p)[x]`` polynomial. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_sqf_part + + >>> gf_sqf_part(ZZ.map([1, 1, 3, 0, 1, 0, 2, 2, 1]), 5, ZZ) + [1, 4, 3] + + """ + _, sqf = gf_sqf_list(f, p, K) + + g = [K.one] + + for f, _ in sqf: + g = gf_mul(g, f, p, K) + + return g + + +def gf_sqf_list(f, p, K, all=False): + """ + Return the square-free decomposition of a ``GF(p)[x]`` polynomial. + + Given a polynomial ``f`` in ``GF(p)[x]``, returns the leading coefficient + of ``f`` and a square-free decomposition ``f_1**e_1 f_2**e_2 ... f_k**e_k`` + such that all ``f_i`` are monic polynomials and ``(f_i, f_j)`` for ``i != j`` + are co-prime and ``e_1 ... e_k`` are given in increasing order. All trivial + terms (i.e. ``f_i = 1``) are not included in the output. + + Consider polynomial ``f = x**11 + 1`` over ``GF(11)[x]``:: + + >>> from sympy.polys.domains import ZZ + + >>> from sympy.polys.galoistools import ( + ... gf_from_dict, gf_diff, gf_sqf_list, gf_pow, + ... ) + ... # doctest: +NORMALIZE_WHITESPACE + + >>> f = gf_from_dict({11: ZZ(1), 0: ZZ(1)}, 11, ZZ) + + Note that ``f'(x) = 0``:: + + >>> gf_diff(f, 11, ZZ) + [] + + This phenomenon does not happen in characteristic zero. However we can + still compute square-free decomposition of ``f`` using ``gf_sqf()``:: + + >>> gf_sqf_list(f, 11, ZZ) + (1, [([1, 1], 11)]) + + We obtained factorization ``f = (x + 1)**11``. This is correct because:: + + >>> gf_pow([1, 1], 11, 11, ZZ) == f + True + + References + ========== + + .. [1] [Geddes92]_ + + """ + n, sqf, factors, r = 1, False, [], int(p) + + lc, f = gf_monic(f, p, K) + + if gf_degree(f) < 1: + return lc, [] + + while True: + F = gf_diff(f, p, K) + + if F != []: + g = gf_gcd(f, F, p, K) + h = gf_quo(f, g, p, K) + + i = 1 + + while h != [K.one]: + G = gf_gcd(g, h, p, K) + H = gf_quo(h, G, p, K) + + if gf_degree(H) > 0: + factors.append((H, i*n)) + + g, h, i = gf_quo(g, G, p, K), G, i + 1 + + if g == [K.one]: + sqf = True + else: + f = g + + if not sqf: + d = gf_degree(f) // r + + for i in range(0, d + 1): + f[i] = f[i*r] + + f, n = f[:d + 1], n*r + else: + break + + if all: + raise ValueError("'all=True' is not supported yet") + + return lc, factors + + +def gf_Qmatrix(f, p, K): + """ + Calculate Berlekamp's ``Q`` matrix. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_Qmatrix + + >>> gf_Qmatrix([3, 2, 4], 5, ZZ) + [[1, 0], + [3, 4]] + + >>> gf_Qmatrix([1, 0, 0, 0, 1], 5, ZZ) + [[1, 0, 0, 0], + [0, 4, 0, 0], + [0, 0, 1, 0], + [0, 0, 0, 4]] + + """ + n, r = gf_degree(f), int(p) + + q = [K.one] + [K.zero]*(n - 1) + Q = [list(q)] + [[]]*(n - 1) + + for i in range(1, (n - 1)*r + 1): + qq, c = [(-q[-1]*f[-1]) % p], q[-1] + + for j in range(1, n): + qq.append((q[j - 1] - c*f[-j - 1]) % p) + + if not (i % r): + Q[i//r] = list(qq) + + q = qq + + return Q + + +def gf_Qbasis(Q, p, K): + """ + Compute a basis of the kernel of ``Q``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_Qmatrix, gf_Qbasis + + >>> gf_Qbasis(gf_Qmatrix([1, 0, 0, 0, 1], 5, ZZ), 5, ZZ) + [[1, 0, 0, 0], [0, 0, 1, 0]] + + >>> gf_Qbasis(gf_Qmatrix([3, 2, 4], 5, ZZ), 5, ZZ) + [[1, 0]] + + """ + Q, n = [ list(q) for q in Q ], len(Q) + + for k in range(0, n): + Q[k][k] = (Q[k][k] - K.one) % p + + for k in range(0, n): + for i in range(k, n): + if Q[k][i]: + break + else: + continue + + inv = K.invert(Q[k][i], p) + + for j in range(0, n): + Q[j][i] = (Q[j][i]*inv) % p + + for j in range(0, n): + t = Q[j][k] + Q[j][k] = Q[j][i] + Q[j][i] = t + + for i in range(0, n): + if i != k: + q = Q[k][i] + + for j in range(0, n): + Q[j][i] = (Q[j][i] - Q[j][k]*q) % p + + for i in range(0, n): + for j in range(0, n): + if i == j: + Q[i][j] = (K.one - Q[i][j]) % p + else: + Q[i][j] = (-Q[i][j]) % p + + basis = [] + + for q in Q: + if any(q): + basis.append(q) + + return basis + + +def gf_berlekamp(f, p, K): + """ + Factor a square-free ``f`` in ``GF(p)[x]`` for small ``p``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_berlekamp + + >>> gf_berlekamp([1, 0, 0, 0, 1], 5, ZZ) + [[1, 0, 2], [1, 0, 3]] + + """ + Q = gf_Qmatrix(f, p, K) + V = gf_Qbasis(Q, p, K) + + for i, v in enumerate(V): + V[i] = gf_strip(list(reversed(v))) + + factors = [f] + + for k in range(1, len(V)): + for f in list(factors): + s = K.zero + + while s < p: + g = gf_sub_ground(V[k], s, p, K) + h = gf_gcd(f, g, p, K) + + if h != [K.one] and h != f: + factors.remove(f) + + f = gf_quo(f, h, p, K) + factors.extend([f, h]) + + if len(factors) == len(V): + return _sort_factors(factors, multiple=False) + + s += K.one + + return _sort_factors(factors, multiple=False) + + +def gf_ddf_zassenhaus(f, p, K): + """ + Cantor-Zassenhaus: Deterministic Distinct Degree Factorization + + Given a monic square-free polynomial ``f`` in ``GF(p)[x]``, computes + partial distinct degree factorization ``f_1 ... f_d`` of ``f`` where + ``deg(f_i) != deg(f_j)`` for ``i != j``. The result is returned as a + list of pairs ``(f_i, e_i)`` where ``deg(f_i) > 0`` and ``e_i > 0`` + is an argument to the equal degree factorization routine. + + Consider the polynomial ``x**15 - 1`` in ``GF(11)[x]``:: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_from_dict + + >>> f = gf_from_dict({15: ZZ(1), 0: ZZ(-1)}, 11, ZZ) + + Distinct degree factorization gives:: + + >>> from sympy.polys.galoistools import gf_ddf_zassenhaus + + >>> gf_ddf_zassenhaus(f, 11, ZZ) + [([1, 0, 0, 0, 0, 10], 1), ([1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1], 2)] + + which means ``x**15 - 1 = (x**5 - 1) (x**10 + x**5 + 1)``. To obtain + factorization into irreducibles, use equal degree factorization + procedure (EDF) with each of the factors. + + References + ========== + + .. [1] [Gathen99]_ + .. [2] [Geddes92]_ + + """ + i, g, factors = 1, [K.one, K.zero], [] + + b = gf_frobenius_monomial_base(f, p, K) + while 2*i <= gf_degree(f): + g = gf_frobenius_map(g, f, b, p, K) + h = gf_gcd(f, gf_sub(g, [K.one, K.zero], p, K), p, K) + + if h != [K.one]: + factors.append((h, i)) + + f = gf_quo(f, h, p, K) + g = gf_rem(g, f, p, K) + b = gf_frobenius_monomial_base(f, p, K) + + i += 1 + + if f != [K.one]: + return factors + [(f, gf_degree(f))] + else: + return factors + + +def gf_edf_zassenhaus(f, n, p, K): + """ + Cantor-Zassenhaus: Probabilistic Equal Degree Factorization + + Given a monic square-free polynomial ``f`` in ``GF(p)[x]`` and + an integer ``n``, such that ``n`` divides ``deg(f)``, returns all + irreducible factors ``f_1,...,f_d`` of ``f``, each of degree ``n``. + EDF procedure gives complete factorization over Galois fields. + + Consider the square-free polynomial ``f = x**3 + x**2 + x + 1`` in + ``GF(5)[x]``. Let's compute its irreducible factors of degree one:: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_edf_zassenhaus + + >>> gf_edf_zassenhaus([1,1,1,1], 1, 5, ZZ) + [[1, 1], [1, 2], [1, 3]] + + Notes + ===== + + The case p == 2 is handled by Cohen's Algorithm 3.4.8. The case p odd is + as in Geddes Algorithm 8.9 (or Cohen's Algorithm 3.4.6). + + References + ========== + + .. [1] [Gathen99]_ + .. [2] [Geddes92]_ Algorithm 8.9 + .. [3] [Cohen93]_ Algorithm 3.4.8 + + """ + factors = [f] + + if gf_degree(f) <= n: + return factors + + N = gf_degree(f) // n + if p != 2: + b = gf_frobenius_monomial_base(f, p, K) + + t = [K.one, K.zero] + while len(factors) < N: + if p == 2: + h = r = t + + for i in range(n - 1): + r = gf_pow_mod(r, 2, f, p, K) + h = gf_add(h, r, p, K) + + g = gf_gcd(f, h, p, K) + t += [K.zero, K.zero] + else: + r = gf_random(2 * n - 1, p, K) + h = _gf_pow_pnm1d2(r, n, f, b, p, K) + g = gf_gcd(f, gf_sub_ground(h, K.one, p, K), p, K) + + if g != [K.one] and g != f: + factors = gf_edf_zassenhaus(g, n, p, K) \ + + gf_edf_zassenhaus(gf_quo(f, g, p, K), n, p, K) + + return _sort_factors(factors, multiple=False) + + +def gf_ddf_shoup(f, p, K): + """ + Kaltofen-Shoup: Deterministic Distinct Degree Factorization + + Given a monic square-free polynomial ``f`` in ``GF(p)[x]``, computes + partial distinct degree factorization ``f_1,...,f_d`` of ``f`` where + ``deg(f_i) != deg(f_j)`` for ``i != j``. The result is returned as a + list of pairs ``(f_i, e_i)`` where ``deg(f_i) > 0`` and ``e_i > 0`` + is an argument to the equal degree factorization routine. + + This algorithm is an improved version of Zassenhaus algorithm for + large ``deg(f)`` and modulus ``p`` (especially for ``deg(f) ~ lg(p)``). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_ddf_shoup, gf_from_dict + + >>> f = gf_from_dict({6: ZZ(1), 5: ZZ(-1), 4: ZZ(1), 3: ZZ(1), 1: ZZ(-1)}, 3, ZZ) + + >>> gf_ddf_shoup(f, 3, ZZ) + [([1, 1, 0], 1), ([1, 1, 0, 1, 2], 2)] + + References + ========== + + .. [1] [Kaltofen98]_ + .. [2] [Shoup95]_ + .. [3] [Gathen92]_ + + """ + n = gf_degree(f) + k = int(_ceil(_sqrt(n//2))) + b = gf_frobenius_monomial_base(f, p, K) + h = gf_frobenius_map([K.one, K.zero], f, b, p, K) + # U[i] = x**(p**i) + U = [[K.one, K.zero], h] + [K.zero]*(k - 1) + + for i in range(2, k + 1): + U[i] = gf_frobenius_map(U[i-1], f, b, p, K) + + h, U = U[k], U[:k] + # V[i] = x**(p**(k*(i+1))) + V = [h] + [K.zero]*(k - 1) + + for i in range(1, k): + V[i] = gf_compose_mod(V[i - 1], h, f, p, K) + + factors = [] + + for i, v in enumerate(V): + h, j = [K.one], k - 1 + + for u in U: + g = gf_sub(v, u, p, K) + h = gf_mul(h, g, p, K) + h = gf_rem(h, f, p, K) + + g = gf_gcd(f, h, p, K) + f = gf_quo(f, g, p, K) + + for u in reversed(U): + h = gf_sub(v, u, p, K) + F = gf_gcd(g, h, p, K) + + if F != [K.one]: + factors.append((F, k*(i + 1) - j)) + + g, j = gf_quo(g, F, p, K), j - 1 + + if f != [K.one]: + factors.append((f, gf_degree(f))) + + return factors + +def gf_edf_shoup(f, n, p, K): + """ + Gathen-Shoup: Probabilistic Equal Degree Factorization + + Given a monic square-free polynomial ``f`` in ``GF(p)[x]`` and integer + ``n`` such that ``n`` divides ``deg(f)``, returns all irreducible factors + ``f_1,...,f_d`` of ``f``, each of degree ``n``. This is a complete + factorization over Galois fields. + + This algorithm is an improved version of Zassenhaus algorithm for + large ``deg(f)`` and modulus ``p`` (especially for ``deg(f) ~ lg(p)``). + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_edf_shoup + + >>> gf_edf_shoup(ZZ.map([1, 2837, 2277]), 1, 2917, ZZ) + [[1, 852], [1, 1985]] + + References + ========== + + .. [1] [Shoup91]_ + .. [2] [Gathen92]_ + + """ + N, q = gf_degree(f), int(p) + + if not N: + return [] + if N <= n: + return [f] + + factors, x = [f], [K.one, K.zero] + + r = gf_random(N - 1, p, K) + + if p == 2: + h = gf_pow_mod(x, q, f, p, K) + H = gf_trace_map(r, h, x, n - 1, f, p, K)[1] + h1 = gf_gcd(f, H, p, K) + h2 = gf_quo(f, h1, p, K) + + factors = gf_edf_shoup(h1, n, p, K) \ + + gf_edf_shoup(h2, n, p, K) + else: + b = gf_frobenius_monomial_base(f, p, K) + H = _gf_trace_map(r, n, f, b, p, K) + h = gf_pow_mod(H, (q - 1)//2, f, p, K) + + h1 = gf_gcd(f, h, p, K) + h2 = gf_gcd(f, gf_sub_ground(h, K.one, p, K), p, K) + h3 = gf_quo(f, gf_mul(h1, h2, p, K), p, K) + + factors = gf_edf_shoup(h1, n, p, K) \ + + gf_edf_shoup(h2, n, p, K) \ + + gf_edf_shoup(h3, n, p, K) + + return _sort_factors(factors, multiple=False) + + +def gf_zassenhaus(f, p, K): + """ + Factor a square-free ``f`` in ``GF(p)[x]`` for medium ``p``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_zassenhaus + + >>> gf_zassenhaus(ZZ.map([1, 4, 3]), 5, ZZ) + [[1, 1], [1, 3]] + + """ + factors = [] + + for factor, n in gf_ddf_zassenhaus(f, p, K): + factors += gf_edf_zassenhaus(factor, n, p, K) + + return _sort_factors(factors, multiple=False) + + +def gf_shoup(f, p, K): + """ + Factor a square-free ``f`` in ``GF(p)[x]`` for large ``p``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_shoup + + >>> gf_shoup(ZZ.map([1, 4, 3]), 5, ZZ) + [[1, 1], [1, 3]] + + """ + factors = [] + + for factor, n in gf_ddf_shoup(f, p, K): + factors += gf_edf_shoup(factor, n, p, K) + + return _sort_factors(factors, multiple=False) + +_factor_methods = { + 'berlekamp': gf_berlekamp, # ``p`` : small + 'zassenhaus': gf_zassenhaus, # ``p`` : medium + 'shoup': gf_shoup, # ``p`` : large +} + + +def gf_factor_sqf(f, p, K, method=None): + """ + Factor a square-free polynomial ``f`` in ``GF(p)[x]``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_factor_sqf + + >>> gf_factor_sqf(ZZ.map([3, 2, 4]), 5, ZZ) + (3, [[1, 1], [1, 3]]) + + """ + lc, f = gf_monic(f, p, K) + + if gf_degree(f) < 1: + return lc, [] + + method = method or query('GF_FACTOR_METHOD') + + if method is not None: + factors = _factor_methods[method](f, p, K) + else: + factors = gf_zassenhaus(f, p, K) + + return lc, factors + + +def gf_factor(f, p, K): + """ + Factor (non square-free) polynomials in ``GF(p)[x]``. + + Given a possibly non square-free polynomial ``f`` in ``GF(p)[x]``, + returns its complete factorization into irreducibles:: + + f_1(x)**e_1 f_2(x)**e_2 ... f_d(x)**e_d + + where each ``f_i`` is a monic polynomial and ``gcd(f_i, f_j) == 1``, + for ``i != j``. The result is given as a tuple consisting of the + leading coefficient of ``f`` and a list of factors of ``f`` with + their multiplicities. + + The algorithm proceeds by first computing square-free decomposition + of ``f`` and then iteratively factoring each of square-free factors. + + Consider a non square-free polynomial ``f = (7*x + 1) (x + 2)**2`` in + ``GF(11)[x]``. We obtain its factorization into irreducibles as follows:: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.galoistools import gf_factor + + >>> gf_factor(ZZ.map([5, 2, 7, 2]), 11, ZZ) + (5, [([1, 2], 1), ([1, 8], 2)]) + + We arrived with factorization ``f = 5 (x + 2) (x + 8)**2``. We did not + recover the exact form of the input polynomial because we requested to + get monic factors of ``f`` and its leading coefficient separately. + + Square-free factors of ``f`` can be factored into irreducibles over + ``GF(p)`` using three very different methods: + + Berlekamp + efficient for very small values of ``p`` (usually ``p < 25``) + Cantor-Zassenhaus + efficient on average input and with "typical" ``p`` + Shoup-Kaltofen-Gathen + efficient with very large inputs and modulus + + If you want to use a specific factorization method, instead of the default + one, set ``GF_FACTOR_METHOD`` with one of ``berlekamp``, ``zassenhaus`` or + ``shoup`` values. + + References + ========== + + .. [1] [Gathen99]_ + + """ + lc, f = gf_monic(f, p, K) + + if gf_degree(f) < 1: + return lc, [] + + factors = [] + + for g, n in gf_sqf_list(f, p, K)[1]: + for h in gf_factor_sqf(g, p, K)[1]: + factors.append((h, n)) + + return lc, _sort_factors(factors) + + +def gf_value(f, a): + """ + Value of polynomial 'f' at 'a' in field R. + + Examples + ======== + + >>> from sympy.polys.galoistools import gf_value + + >>> gf_value([1, 7, 2, 4], 11) + 2204 + + """ + result = 0 + for c in f: + result *= a + result += c + return result + + +def linear_congruence(a, b, m): + """ + Returns the values of x satisfying a*x congruent b mod(m) + + Here m is positive integer and a, b are natural numbers. + This function returns only those values of x which are distinct mod(m). + + Examples + ======== + + >>> from sympy.polys.galoistools import linear_congruence + + >>> linear_congruence(3, 12, 15) + [4, 9, 14] + + There are 3 solutions distinct mod(15) since gcd(a, m) = gcd(3, 15) = 3. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Linear_congruence_theorem + + """ + from sympy.polys.polytools import gcdex + if a % m == 0: + if b % m == 0: + return list(range(m)) + else: + return [] + r, _, g = gcdex(a, m) + if b % g != 0: + return [] + return [(r * b // g + t * m // g) % m for t in range(g)] + + +def _raise_mod_power(x, s, p, f): + """ + Used in gf_csolve to generate solutions of f(x) cong 0 mod(p**(s + 1)) + from the solutions of f(x) cong 0 mod(p**s). + + Examples + ======== + + >>> from sympy.polys.galoistools import _raise_mod_power + >>> from sympy.polys.galoistools import csolve_prime + + These is the solutions of f(x) = x**2 + x + 7 cong 0 mod(3) + + >>> f = [1, 1, 7] + >>> csolve_prime(f, 3) + [1] + >>> [ i for i in range(3) if not (i**2 + i + 7) % 3] + [1] + + The solutions of f(x) cong 0 mod(9) are constructed from the + values returned from _raise_mod_power: + + >>> x, s, p = 1, 1, 3 + >>> V = _raise_mod_power(x, s, p, f) + >>> [x + v * p**s for v in V] + [1, 4, 7] + + And these are confirmed with the following: + + >>> [ i for i in range(3**2) if not (i**2 + i + 7) % 3**2] + [1, 4, 7] + + """ + from sympy.polys.domains import ZZ + f_f = gf_diff(f, p, ZZ) + alpha = gf_value(f_f, x) + beta = - gf_value(f, x) // p**s + return linear_congruence(alpha, beta, p) + + +def _csolve_prime_las_vegas(f, p, seed=None): + r""" Solutions of `f(x) \equiv 0 \pmod{p}`, `f(0) \not\equiv 0 \pmod{p}`. + + Explanation + =========== + + This algorithm is classified as the Las Vegas method. + That is, it always returns the correct answer and solves the problem + fast in many cases, but if it is unlucky, it does not answer forever. + + Suppose the polynomial f is not a zero polynomial. Assume further + that it is of degree at most p-1 and `f(0)\not\equiv 0 \pmod{p}`. + These assumptions are not an essential part of the algorithm, + only that it is more convenient for the function calling this + function to resolve them. + + Note that `x^{p-1} - 1 \equiv \prod_{a=1}^{p-1}(x - a) \pmod{p}`. + Thus, the greatest common divisor with f is `\prod_{s \in S}(x - s)`, + with S being the set of solutions to f. Furthermore, + when a is randomly determined, `(x+a)^{(p-1)/2}-1` is + a polynomial with (p-1)/2 randomly chosen solutions. + The greatest common divisor of f may be a nontrivial factor of f. + + When p is large and the degree of f is small, + it is faster than naive solution methods. + + Parameters + ========== + + f : polynomial + p : prime number + + Returns + ======= + + list[int] + a list of solutions, sorted in ascending order + by integers in the range [1, p). The same value + does not exist in the list even if there is + a multiple solution. If no solution exists, returns []. + + Examples + ======== + + >>> from sympy.polys.galoistools import _csolve_prime_las_vegas + >>> _csolve_prime_las_vegas([1, 4, 3], 7) # x^2 + 4x + 3 = 0 (mod 7) + [4, 6] + >>> _csolve_prime_las_vegas([5, 7, 1, 9], 11) # 5x^3 + 7x^2 + x + 9 = 0 (mod 11) + [1, 5, 8] + + References + ========== + + .. [1] R. Crandall and C. Pomerance "Prime Numbers", 2nd Ed., Algorithm 2.3.10 + + """ + from sympy.polys.domains import ZZ + from sympy.ntheory import sqrt_mod + randint = _randint(seed) + root = set() + g = gf_pow_mod([1, 0], p - 1, f, p, ZZ) + g = gf_sub_ground(g, 1, p, ZZ) + # We want to calculate gcd(x**(p-1) - 1, f(x)) + factors = [gf_gcd(f, g, p, ZZ)] + while factors: + f = factors.pop() + # If the degree is small, solve directly + if len(f) <= 1: + continue + if len(f) == 2: + root.add(-invert(f[0], p) * f[1] % p) + continue + if len(f) == 3: + inv = invert(f[0], p) + b = f[1] * inv % p + b = (b + p * (b % 2)) // 2 + root.update((r - b) % p for r in + sqrt_mod(b**2 - f[2] * inv, p, all_roots=True)) + continue + while True: + # Determine `a` randomly and + # compute gcd((x+a)**((p-1)//2)-1, f(x)) + a = randint(0, p - 1) + g = gf_pow_mod([1, a], (p - 1) // 2, f, p, ZZ) + g = gf_sub_ground(g, 1, p, ZZ) + g = gf_gcd(f, g, p, ZZ) + if 1 < len(g) < len(f): + factors.append(g) + factors.append(gf_div(f, g, p, ZZ)[0]) + break + return sorted(root) + + +def csolve_prime(f, p, e=1): + r""" Solutions of `f(x) \equiv 0 \pmod{p^e}`. + + Parameters + ========== + + f : polynomial + p : prime number + e : positive integer + + Returns + ======= + + list[int] + a list of solutions, sorted in ascending order + by integers in the range [1, p**e). The same value + does not exist in the list even if there is + a multiple solution. If no solution exists, returns []. + + Examples + ======== + + >>> from sympy.polys.galoistools import csolve_prime + >>> csolve_prime([1, 1, 7], 3, 1) + [1] + >>> csolve_prime([1, 1, 7], 3, 2) + [1, 4, 7] + + Solutions [7, 4, 1] (mod 3**2) are generated by ``_raise_mod_power()`` + from solution [1] (mod 3). + """ + from sympy.polys.domains import ZZ + g = [MPZ(int(c)) for c in f] + # Convert to polynomial of degree at most p-1 + for i in range(len(g) - p): + g[i + p - 1] += g[i] + g[i] = 0 + g = gf_trunc(g, p) + # Checks whether g(x) is divisible by x + k = 0 + while k < len(g) and g[len(g) - k - 1] == 0: + k += 1 + if k: + g = g[:-k] + root_zero = [0] + else: + root_zero = [] + if g == []: + X1 = list(range(p)) + elif len(g)**2 < p: + # The conditions under which `_csolve_prime_las_vegas` is faster than + # a naive solution are worth considering. + X1 = root_zero + _csolve_prime_las_vegas(g, p) + else: + X1 = root_zero + [i for i in range(p) if gf_eval(g, i, p, ZZ) == 0] + if e == 1: + return X1 + X = [] + S = list(zip(X1, [1]*len(X1))) + while S: + x, s = S.pop() + if s == e: + X.append(x) + else: + s1 = s + 1 + ps = p**s + S.extend([(x + v*ps, s1) for v in _raise_mod_power(x, s, p, f)]) + return sorted(X) + + +def gf_csolve(f, n): + """ + To solve f(x) congruent 0 mod(n). + + n is divided into canonical factors and f(x) cong 0 mod(p**e) will be + solved for each factor. Applying the Chinese Remainder Theorem to the + results returns the final answers. + + Examples + ======== + + Solve [1, 1, 7] congruent 0 mod(189): + + >>> from sympy.polys.galoistools import gf_csolve + >>> gf_csolve([1, 1, 7], 189) + [13, 49, 76, 112, 139, 175] + + See Also + ======== + + sympy.ntheory.residue_ntheory.polynomial_congruence : a higher level solving routine + + References + ========== + + .. [1] 'An introduction to the Theory of Numbers' 5th Edition by Ivan Niven, + Zuckerman and Montgomery. + + """ + from sympy.polys.domains import ZZ + from sympy.ntheory import factorint + P = factorint(n) + X = [csolve_prime(f, p, e) for p, e in P.items()] + pools = list(map(tuple, X)) + perms = [[]] + for pool in pools: + perms = [x + [y] for x in perms for y in pool] + dist_factors = [pow(p, e) for p, e in P.items()] + return sorted([gf_crt(per, dist_factors, ZZ) for per in perms]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/groebnertools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/groebnertools.py new file mode 100644 index 0000000000000000000000000000000000000000..fc5c2f228ab4f4182e4c8fff68d974aa25c9d531 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/groebnertools.py @@ -0,0 +1,862 @@ +"""Groebner bases algorithms. """ + + +from sympy.core.symbol import Dummy +from sympy.polys.monomials import monomial_mul, monomial_lcm, monomial_divides, term_div +from sympy.polys.orderings import lex +from sympy.polys.polyerrors import DomainError +from sympy.polys.polyconfig import query + +def groebner(seq, ring, method=None): + """ + Computes Groebner basis for a set of polynomials in `K[X]`. + + Wrapper around the (default) improved Buchberger and the other algorithms + for computing Groebner bases. The choice of algorithm can be changed via + ``method`` argument or :func:`sympy.polys.polyconfig.setup`, where + ``method`` can be either ``buchberger`` or ``f5b``. + + """ + if method is None: + method = query('groebner') + + _groebner_methods = { + 'buchberger': _buchberger, + 'f5b': _f5b, + } + + try: + _groebner = _groebner_methods[method] + except KeyError: + raise ValueError("'%s' is not a valid Groebner bases algorithm (valid are 'buchberger' and 'f5b')" % method) + + domain, orig = ring.domain, None + + if not domain.is_Field or not domain.has_assoc_Field: + try: + orig, ring = ring, ring.clone(domain=domain.get_field()) + except DomainError: + raise DomainError("Cannot compute a Groebner basis over %s" % domain) + else: + seq = [ s.set_ring(ring) for s in seq ] + + G = _groebner(seq, ring) + + if orig is not None: + G = [ g.clear_denoms()[1].set_ring(orig) for g in G ] + + return G + +def _buchberger(f, ring): + """ + Computes Groebner basis for a set of polynomials in `K[X]`. + + Given a set of multivariate polynomials `F`, finds another + set `G`, such that Ideal `F = Ideal G` and `G` is a reduced + Groebner basis. + + The resulting basis is unique and has monic generators if the + ground domains is a field. Otherwise the result is non-unique + but Groebner bases over e.g. integers can be computed (if the + input polynomials are monic). + + Groebner bases can be used to choose specific generators for a + polynomial ideal. Because these bases are unique you can check + for ideal equality by comparing the Groebner bases. To see if + one polynomial lies in an ideal, divide by the elements in the + base and see if the remainder vanishes. + + They can also be used to solve systems of polynomial equations + as, by choosing lexicographic ordering, you can eliminate one + variable at a time, provided that the ideal is zero-dimensional + (finite number of solutions). + + Notes + ===== + + Algorithm used: an improved version of Buchberger's algorithm + as presented in T. Becker, V. Weispfenning, Groebner Bases: A + Computational Approach to Commutative Algebra, Springer, 1993, + page 232. + + References + ========== + + .. [1] [Bose03]_ + .. [2] [Giovini91]_ + .. [3] [Ajwa95]_ + .. [4] [Cox97]_ + + """ + order = ring.order + + monomial_mul = ring.monomial_mul + monomial_div = ring.monomial_div + monomial_lcm = ring.monomial_lcm + + def select(P): + # normal selection strategy + # select the pair with minimum LCM(LM(f), LM(g)) + pr = min(P, key=lambda pair: order(monomial_lcm(f[pair[0]].LM, f[pair[1]].LM))) + return pr + + def normal(g, J): + h = g.rem([ f[j] for j in J ]) + + if not h: + return None + else: + h = h.monic() + + if h not in I: + I[h] = len(f) + f.append(h) + + return h.LM, I[h] + + def update(G, B, ih): + # update G using the set of critical pairs B and h + # [BW] page 230 + h = f[ih] + mh = h.LM + + # filter new pairs (h, g), g in G + C = G.copy() + D = set() + + while C: + # select a pair (h, g) by popping an element from C + ig = C.pop() + g = f[ig] + mg = g.LM + LCMhg = monomial_lcm(mh, mg) + + def lcm_divides(ip): + # LCM(LM(h), LM(p)) divides LCM(LM(h), LM(g)) + m = monomial_lcm(mh, f[ip].LM) + return monomial_div(LCMhg, m) + + # HT(h) and HT(g) disjoint: mh*mg == LCMhg + if monomial_mul(mh, mg) == LCMhg or ( + not any(lcm_divides(ipx) for ipx in C) and + not any(lcm_divides(pr[1]) for pr in D)): + D.add((ih, ig)) + + E = set() + + while D: + # select h, g from D (h the same as above) + ih, ig = D.pop() + mg = f[ig].LM + LCMhg = monomial_lcm(mh, mg) + + if not monomial_mul(mh, mg) == LCMhg: + E.add((ih, ig)) + + # filter old pairs + B_new = set() + + while B: + # select g1, g2 from B (-> CP) + ig1, ig2 = B.pop() + mg1 = f[ig1].LM + mg2 = f[ig2].LM + LCM12 = monomial_lcm(mg1, mg2) + + # if HT(h) does not divide lcm(HT(g1), HT(g2)) + if not monomial_div(LCM12, mh) or \ + monomial_lcm(mg1, mh) == LCM12 or \ + monomial_lcm(mg2, mh) == LCM12: + B_new.add((ig1, ig2)) + + B_new |= E + + # filter polynomials + G_new = set() + + while G: + ig = G.pop() + mg = f[ig].LM + + if not monomial_div(mg, mh): + G_new.add(ig) + + G_new.add(ih) + + return G_new, B_new + # end of update ################################ + + if not f: + return [] + + # replace f with a reduced list of initial polynomials; see [BW] page 203 + f1 = f[:] + + while True: + f = f1[:] + f1 = [] + + for i in range(len(f)): + p = f[i] + r = p.rem(f[:i]) + + if r: + f1.append(r.monic()) + + if f == f1: + break + + I = {} # ip = I[p]; p = f[ip] + F = set() # set of indices of polynomials + G = set() # set of indices of intermediate would-be Groebner basis + CP = set() # set of pairs of indices of critical pairs + + for i, h in enumerate(f): + I[h] = i + F.add(i) + + ##################################### + # algorithm GROEBNERNEWS2 in [BW] page 232 + + while F: + # select p with minimum monomial according to the monomial ordering + h = min([f[x] for x in F], key=lambda f: order(f.LM)) + ih = I[h] + F.remove(ih) + G, CP = update(G, CP, ih) + + # count the number of critical pairs which reduce to zero + reductions_to_zero = 0 + + while CP: + ig1, ig2 = select(CP) + CP.remove((ig1, ig2)) + + h = spoly(f[ig1], f[ig2], ring) + # ordering divisors is on average more efficient [Cox] page 111 + G1 = sorted(G, key=lambda g: order(f[g].LM)) + ht = normal(h, G1) + + if ht: + G, CP = update(G, CP, ht[1]) + else: + reductions_to_zero += 1 + + ###################################### + # now G is a Groebner basis; reduce it + Gr = set() + + for ig in G: + ht = normal(f[ig], G - {ig}) + + if ht: + Gr.add(ht[1]) + + Gr = [f[ig] for ig in Gr] + + # order according to the monomial ordering + Gr = sorted(Gr, key=lambda f: order(f.LM), reverse=True) + + return Gr + +def spoly(p1, p2, ring): + """ + Compute LCM(LM(p1), LM(p2))/LM(p1)*p1 - LCM(LM(p1), LM(p2))/LM(p2)*p2 + This is the S-poly provided p1 and p2 are monic + """ + LM1 = p1.LM + LM2 = p2.LM + LCM12 = ring.monomial_lcm(LM1, LM2) + m1 = ring.monomial_div(LCM12, LM1) + m2 = ring.monomial_div(LCM12, LM2) + s1 = p1.mul_monom(m1) + s2 = p2.mul_monom(m2) + s = s1 - s2 + return s + +# F5B + +# convenience functions + + +def Sign(f): + return f[0] + + +def Polyn(f): + return f[1] + + +def Num(f): + return f[2] + + +def sig(monomial, index): + return (monomial, index) + + +def lbp(signature, polynomial, number): + return (signature, polynomial, number) + +# signature functions + + +def sig_cmp(u, v, order): + """ + Compare two signatures by extending the term order to K[X]^n. + + u < v iff + - the index of v is greater than the index of u + or + - the index of v is equal to the index of u and u[0] < v[0] w.r.t. order + + u > v otherwise + """ + if u[1] > v[1]: + return -1 + if u[1] == v[1]: + #if u[0] == v[0]: + # return 0 + if order(u[0]) < order(v[0]): + return -1 + return 1 + + +def sig_key(s, order): + """ + Key for comparing two signatures. + + s = (m, k), t = (n, l) + + s < t iff [k > l] or [k == l and m < n] + s > t otherwise + """ + return (-s[1], order(s[0])) + + +def sig_mult(s, m): + """ + Multiply a signature by a monomial. + + The product of a signature (m, i) and a monomial n is defined as + (m * t, i). + """ + return sig(monomial_mul(s[0], m), s[1]) + +# labeled polynomial functions + + +def lbp_sub(f, g): + """ + Subtract labeled polynomial g from f. + + The signature and number of the difference of f and g are signature + and number of the maximum of f and g, w.r.t. lbp_cmp. + """ + if sig_cmp(Sign(f), Sign(g), Polyn(f).ring.order) < 0: + max_poly = g + else: + max_poly = f + + ret = Polyn(f) - Polyn(g) + + return lbp(Sign(max_poly), ret, Num(max_poly)) + + +def lbp_mul_term(f, cx): + """ + Multiply a labeled polynomial with a term. + + The product of a labeled polynomial (s, p, k) by a monomial is + defined as (m * s, m * p, k). + """ + return lbp(sig_mult(Sign(f), cx[0]), Polyn(f).mul_term(cx), Num(f)) + + +def lbp_cmp(f, g): + """ + Compare two labeled polynomials. + + f < g iff + - Sign(f) < Sign(g) + or + - Sign(f) == Sign(g) and Num(f) > Num(g) + + f > g otherwise + """ + if sig_cmp(Sign(f), Sign(g), Polyn(f).ring.order) == -1: + return -1 + if Sign(f) == Sign(g): + if Num(f) > Num(g): + return -1 + #if Num(f) == Num(g): + # return 0 + return 1 + + +def lbp_key(f): + """ + Key for comparing two labeled polynomials. + """ + return (sig_key(Sign(f), Polyn(f).ring.order), -Num(f)) + +# algorithm and helper functions + + +def critical_pair(f, g, ring): + """ + Compute the critical pair corresponding to two labeled polynomials. + + A critical pair is a tuple (um, f, vm, g), where um and vm are + terms such that um * f - vm * g is the S-polynomial of f and g (so, + wlog assume um * f > vm * g). + For performance sake, a critical pair is represented as a tuple + (Sign(um * f), um, f, Sign(vm * g), vm, g), since um * f creates + a new, relatively expensive object in memory, whereas Sign(um * + f) and um are lightweight and f (in the tuple) is a reference to + an already existing object in memory. + """ + domain = ring.domain + + ltf = Polyn(f).LT + ltg = Polyn(g).LT + lt = (monomial_lcm(ltf[0], ltg[0]), domain.one) + + um = term_div(lt, ltf, domain) + vm = term_div(lt, ltg, domain) + + # The full information is not needed (now), so only the product + # with the leading term is considered: + fr = lbp_mul_term(lbp(Sign(f), Polyn(f).leading_term(), Num(f)), um) + gr = lbp_mul_term(lbp(Sign(g), Polyn(g).leading_term(), Num(g)), vm) + + # return in proper order, such that the S-polynomial is just + # u_first * f_first - u_second * f_second: + if lbp_cmp(fr, gr) == -1: + return (Sign(gr), vm, g, Sign(fr), um, f) + else: + return (Sign(fr), um, f, Sign(gr), vm, g) + + +def cp_cmp(c, d): + """ + Compare two critical pairs c and d. + + c < d iff + - lbp(c[0], _, Num(c[2]) < lbp(d[0], _, Num(d[2])) (this + corresponds to um_c * f_c and um_d * f_d) + or + - lbp(c[0], _, Num(c[2]) >< lbp(d[0], _, Num(d[2])) and + lbp(c[3], _, Num(c[5])) < lbp(d[3], _, Num(d[5])) (this + corresponds to vm_c * g_c and vm_d * g_d) + + c > d otherwise + """ + zero = Polyn(c[2]).ring.zero + + c0 = lbp(c[0], zero, Num(c[2])) + d0 = lbp(d[0], zero, Num(d[2])) + + r = lbp_cmp(c0, d0) + + if r == -1: + return -1 + if r == 0: + c1 = lbp(c[3], zero, Num(c[5])) + d1 = lbp(d[3], zero, Num(d[5])) + + r = lbp_cmp(c1, d1) + + if r == -1: + return -1 + #if r == 0: + # return 0 + return 1 + + +def cp_key(c, ring): + """ + Key for comparing critical pairs. + """ + return (lbp_key(lbp(c[0], ring.zero, Num(c[2]))), lbp_key(lbp(c[3], ring.zero, Num(c[5])))) + + +def s_poly(cp): + """ + Compute the S-polynomial of a critical pair. + + The S-polynomial of a critical pair cp is cp[1] * cp[2] - cp[4] * cp[5]. + """ + return lbp_sub(lbp_mul_term(cp[2], cp[1]), lbp_mul_term(cp[5], cp[4])) + + +def is_rewritable_or_comparable(sign, num, B): + """ + Check if a labeled polynomial is redundant by checking if its + signature and number imply rewritability or comparability. + + (sign, num) is comparable if there exists a labeled polynomial + h in B, such that sign[1] (the index) is less than Sign(h)[1] + and sign[0] is divisible by the leading monomial of h. + + (sign, num) is rewritable if there exists a labeled polynomial + h in B, such thatsign[1] is equal to Sign(h)[1], num < Num(h) + and sign[0] is divisible by Sign(h)[0]. + """ + for h in B: + # comparable + if sign[1] < Sign(h)[1]: + if monomial_divides(Polyn(h).LM, sign[0]): + return True + + # rewritable + if sign[1] == Sign(h)[1]: + if num < Num(h): + if monomial_divides(Sign(h)[0], sign[0]): + return True + return False + + +def f5_reduce(f, B): + """ + F5-reduce a labeled polynomial f by B. + + Continuously searches for non-zero labeled polynomial h in B, such + that the leading term lt_h of h divides the leading term lt_f of + f and Sign(lt_h * h) < Sign(f). If such a labeled polynomial h is + found, f gets replaced by f - lt_f / lt_h * h. If no such h can be + found or f is 0, f is no further F5-reducible and f gets returned. + + A polynomial that is reducible in the usual sense need not be + F5-reducible, e.g.: + + >>> from sympy.polys.groebnertools import lbp, sig, f5_reduce, Polyn + >>> from sympy.polys import ring, QQ, lex + + >>> R, x,y,z = ring("x,y,z", QQ, lex) + + >>> f = lbp(sig((1, 1, 1), 4), x, 3) + >>> g = lbp(sig((0, 0, 0), 2), x, 2) + + >>> Polyn(f).rem([Polyn(g)]) + 0 + >>> f5_reduce(f, [g]) + (((1, 1, 1), 4), x, 3) + + """ + order = Polyn(f).ring.order + domain = Polyn(f).ring.domain + + if not Polyn(f): + return f + + while True: + g = f + + for h in B: + if Polyn(h): + if monomial_divides(Polyn(h).LM, Polyn(f).LM): + t = term_div(Polyn(f).LT, Polyn(h).LT, domain) + if sig_cmp(sig_mult(Sign(h), t[0]), Sign(f), order) < 0: + # The following check need not be done and is in general slower than without. + #if not is_rewritable_or_comparable(Sign(gp), Num(gp), B): + hp = lbp_mul_term(h, t) + f = lbp_sub(f, hp) + break + + if g == f or not Polyn(f): + return f + + +def _f5b(F, ring): + """ + Computes a reduced Groebner basis for the ideal generated by F. + + f5b is an implementation of the F5B algorithm by Yao Sun and + Dingkang Wang. Similarly to Buchberger's algorithm, the algorithm + proceeds by computing critical pairs, computing the S-polynomial, + reducing it and adjoining the reduced S-polynomial if it is not 0. + + Unlike Buchberger's algorithm, each polynomial contains additional + information, namely a signature and a number. The signature + specifies the path of computation (i.e. from which polynomial in + the original basis was it derived and how), the number says when + the polynomial was added to the basis. With this information it + is (often) possible to decide if an S-polynomial will reduce to + 0 and can be discarded. + + Optimizations include: Reducing the generators before computing + a Groebner basis, removing redundant critical pairs when a new + polynomial enters the basis and sorting the critical pairs and + the current basis. + + Once a Groebner basis has been found, it gets reduced. + + References + ========== + + .. [1] Yao Sun, Dingkang Wang: "A New Proof for the Correctness of F5 + (F5-Like) Algorithm", https://arxiv.org/abs/1004.0084 (specifically + v4) + + .. [2] Thomas Becker, Volker Weispfenning, Groebner bases: A computational + approach to commutative algebra, 1993, p. 203, 216 + """ + order = ring.order + + # reduce polynomials (like in Mario Pernici's implementation) (Becker, Weispfenning, p. 203) + B = F + while True: + F = B + B = [] + + for i in range(len(F)): + p = F[i] + r = p.rem(F[:i]) + + if r: + B.append(r) + + if F == B: + break + + # basis + B = [lbp(sig(ring.zero_monom, i + 1), F[i], i + 1) for i in range(len(F))] + B.sort(key=lambda f: order(Polyn(f).LM), reverse=True) + + # critical pairs + CP = [critical_pair(B[i], B[j], ring) for i in range(len(B)) for j in range(i + 1, len(B))] + CP.sort(key=lambda cp: cp_key(cp, ring), reverse=True) + + k = len(B) + + reductions_to_zero = 0 + + while len(CP): + cp = CP.pop() + + # discard redundant critical pairs: + if is_rewritable_or_comparable(cp[0], Num(cp[2]), B): + continue + if is_rewritable_or_comparable(cp[3], Num(cp[5]), B): + continue + + s = s_poly(cp) + + p = f5_reduce(s, B) + + p = lbp(Sign(p), Polyn(p).monic(), k + 1) + + if Polyn(p): + # remove old critical pairs, that become redundant when adding p: + indices = [] + for i, cp in enumerate(CP): + if is_rewritable_or_comparable(cp[0], Num(cp[2]), [p]): + indices.append(i) + elif is_rewritable_or_comparable(cp[3], Num(cp[5]), [p]): + indices.append(i) + + for i in reversed(indices): + del CP[i] + + # only add new critical pairs that are not made redundant by p: + for g in B: + if Polyn(g): + cp = critical_pair(p, g, ring) + if is_rewritable_or_comparable(cp[0], Num(cp[2]), [p]): + continue + elif is_rewritable_or_comparable(cp[3], Num(cp[5]), [p]): + continue + + CP.append(cp) + + # sort (other sorting methods/selection strategies were not as successful) + CP.sort(key=lambda cp: cp_key(cp, ring), reverse=True) + + # insert p into B: + m = Polyn(p).LM + if order(m) <= order(Polyn(B[-1]).LM): + B.append(p) + else: + for i, q in enumerate(B): + if order(m) > order(Polyn(q).LM): + B.insert(i, p) + break + + k += 1 + + #print(len(B), len(CP), "%d critical pairs removed" % len(indices)) + else: + reductions_to_zero += 1 + + # reduce Groebner basis: + H = [Polyn(g).monic() for g in B] + H = red_groebner(H, ring) + + return sorted(H, key=lambda f: order(f.LM), reverse=True) + + +def red_groebner(G, ring): + """ + Compute reduced Groebner basis, from BeckerWeispfenning93, p. 216 + + Selects a subset of generators, that already generate the ideal + and computes a reduced Groebner basis for them. + """ + def reduction(P): + """ + The actual reduction algorithm. + """ + Q = [] + for i, p in enumerate(P): + h = p.rem(P[:i] + P[i + 1:]) + if h: + Q.append(h) + + return [p.monic() for p in Q] + + F = G + H = [] + + while F: + f0 = F.pop() + + if not any(monomial_divides(f.LM, f0.LM) for f in F + H): + H.append(f0) + + # Becker, Weispfenning, p. 217: H is Groebner basis of the ideal generated by G. + return reduction(H) + + +def is_groebner(G, ring): + """ + Check if G is a Groebner basis. + """ + for i in range(len(G)): + for j in range(i + 1, len(G)): + s = spoly(G[i], G[j], ring) + s = s.rem(G) + if s: + return False + + return True + + +def is_minimal(G, ring): + """ + Checks if G is a minimal Groebner basis. + """ + order = ring.order + domain = ring.domain + + G.sort(key=lambda g: order(g.LM)) + + for i, g in enumerate(G): + if g.LC != domain.one: + return False + + for h in G[:i] + G[i + 1:]: + if monomial_divides(h.LM, g.LM): + return False + + return True + + +def is_reduced(G, ring): + """ + Checks if G is a reduced Groebner basis. + """ + order = ring.order + domain = ring.domain + + G.sort(key=lambda g: order(g.LM)) + + for i, g in enumerate(G): + if g.LC != domain.one: + return False + + for term in g.terms(): + for h in G[:i] + G[i + 1:]: + if monomial_divides(h.LM, term[0]): + return False + + return True + +def groebner_lcm(f, g): + """ + Computes LCM of two polynomials using Groebner bases. + + The LCM is computed as the unique generator of the intersection + of the two ideals generated by `f` and `g`. The approach is to + compute a Groebner basis with respect to lexicographic ordering + of `t*f` and `(1 - t)*g`, where `t` is an unrelated variable and + then filtering out the solution that does not contain `t`. + + References + ========== + + .. [1] [Cox97]_ + + """ + if f.ring != g.ring: + raise ValueError("Values should be equal") + + ring = f.ring + domain = ring.domain + + if not f or not g: + return ring.zero + + if len(f) <= 1 and len(g) <= 1: + monom = monomial_lcm(f.LM, g.LM) + coeff = domain.lcm(f.LC, g.LC) + return ring.term_new(monom, coeff) + + fc, f = f.primitive() + gc, g = g.primitive() + + lcm = domain.lcm(fc, gc) + + f_terms = [ ((1,) + monom, coeff) for monom, coeff in f.terms() ] + g_terms = [ ((0,) + monom, coeff) for monom, coeff in g.terms() ] \ + + [ ((1,) + monom,-coeff) for monom, coeff in g.terms() ] + + t = Dummy("t") + t_ring = ring.clone(symbols=(t,) + ring.symbols, order=lex) + + F = t_ring.from_terms(f_terms) + G = t_ring.from_terms(g_terms) + + basis = groebner([F, G], t_ring) + + def is_independent(h, j): + return not any(monom[j] for monom in h.monoms()) + + H = [ h for h in basis if is_independent(h, 0) ] + + h_terms = [ (monom[1:], coeff*lcm) for monom, coeff in H[0].terms() ] + h = ring.from_terms(h_terms) + + return h + +def groebner_gcd(f, g): + """Computes GCD of two polynomials using Groebner bases. """ + if f.ring != g.ring: + raise ValueError("Values should be equal") + domain = f.ring.domain + + if not domain.is_Field: + fc, f = f.primitive() + gc, g = g.primitive() + gcd = domain.gcd(fc, gc) + + H = (f*g).quo([groebner_lcm(f, g)]) + + if len(H) != 1: + raise ValueError("Length should be 1") + h = H[0] + + if not domain.is_Field: + return gcd*h + else: + return h.monic() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/heuristicgcd.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/heuristicgcd.py new file mode 100644 index 0000000000000000000000000000000000000000..ea9eeac952e88552d729f0bd3073dee21b6ab68b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/heuristicgcd.py @@ -0,0 +1,149 @@ +"""Heuristic polynomial GCD algorithm (HEUGCD). """ + +from .polyerrors import HeuristicGCDFailed + +HEU_GCD_MAX = 6 + +def heugcd(f, g): + """ + Heuristic polynomial GCD in ``Z[X]``. + + Given univariate polynomials ``f`` and ``g`` in ``Z[X]``, returns + their GCD and cofactors, i.e. polynomials ``h``, ``cff`` and ``cfg`` + such that:: + + h = gcd(f, g), cff = quo(f, h) and cfg = quo(g, h) + + The algorithm is purely heuristic which means it may fail to compute + the GCD. This will be signaled by raising an exception. In this case + you will need to switch to another GCD method. + + The algorithm computes the polynomial GCD by evaluating polynomials + ``f`` and ``g`` at certain points and computing (fast) integer GCD + of those evaluations. The polynomial GCD is recovered from the integer + image by interpolation. The evaluation process reduces f and g variable + by variable into a large integer. The final step is to verify if the + interpolated polynomial is the correct GCD. This gives cofactors of + the input polynomials as a side effect. + + Examples + ======== + + >>> from sympy.polys.heuristicgcd import heugcd + >>> from sympy.polys import ring, ZZ + + >>> R, x,y, = ring("x,y", ZZ) + + >>> f = x**2 + 2*x*y + y**2 + >>> g = x**2 + x*y + + >>> h, cff, cfg = heugcd(f, g) + >>> h, cff, cfg + (x + y, x + y, x) + + >>> cff*h == f + True + >>> cfg*h == g + True + + References + ========== + + .. [1] [Liao95]_ + + """ + assert f.ring == g.ring and f.ring.domain.is_ZZ + + ring = f.ring + x0 = ring.gens[0] + domain = ring.domain + + gcd, f, g = f.extract_ground(g) + + f_norm = f.max_norm() + g_norm = g.max_norm() + + B = domain(2*min(f_norm, g_norm) + 29) + + x = max(min(B, 99*domain.sqrt(B)), + 2*min(f_norm // abs(f.LC), + g_norm // abs(g.LC)) + 4) + + for i in range(0, HEU_GCD_MAX): + ff = f.evaluate(x0, x) + gg = g.evaluate(x0, x) + + if ff and gg: + if ring.ngens == 1: + h, cff, cfg = domain.cofactors(ff, gg) + else: + h, cff, cfg = heugcd(ff, gg) + + h = _gcd_interpolate(h, x, ring) + h = h.primitive()[1] + + cff_, r = f.div(h) + + if not r: + cfg_, r = g.div(h) + + if not r: + h = h.mul_ground(gcd) + return h, cff_, cfg_ + + cff = _gcd_interpolate(cff, x, ring) + + h, r = f.div(cff) + + if not r: + cfg_, r = g.div(h) + + if not r: + h = h.mul_ground(gcd) + return h, cff, cfg_ + + cfg = _gcd_interpolate(cfg, x, ring) + + h, r = g.div(cfg) + + if not r: + cff_, r = f.div(h) + + if not r: + h = h.mul_ground(gcd) + return h, cff_, cfg + + x = 73794*x * domain.sqrt(domain.sqrt(x)) // 27011 + + raise HeuristicGCDFailed('no luck') + +def _gcd_interpolate(h, x, ring): + """Interpolate polynomial GCD from integer GCD. """ + f, i = ring.zero, 0 + + # TODO: don't expose poly repr implementation details + if ring.ngens == 1: + while h: + g = h % x + if g > x // 2: g -= x + h = (h - g) // x + + # f += X**i*g + if g: + f[(i,)] = g + i += 1 + else: + while h: + g = h.trunc_ground(x) + h = (h - g).quo_ground(x) + + # f += X**i*g + if g: + for monom, coeff in g.iterterms(): + f[(i,) + monom] = coeff + i += 1 + + if f.LC < 0: + return -f + else: + return f diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e4ebc3d71ba3dac9ccc695d046d6b3d2ad940fa1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__init__.py @@ -0,0 +1,15 @@ +""" + +sympy.polys.matrices package. + +The main export from this package is the DomainMatrix class which is a +lower-level implementation of matrices based on the polys Domains. This +implementation is typically a lot faster than SymPy's standard Matrix class +but is a work in progress and is still experimental. + +""" +from .domainmatrix import DomainMatrix, DM + +__all__ = [ + 'DomainMatrix', 'DM', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..43add245758aab393b3b5c849bedb42025185f72 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__pycache__/_typing.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/__pycache__/_typing.cpython-310.pyc new file mode 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--git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_dfm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_dfm.py new file mode 100644 index 0000000000000000000000000000000000000000..1d02076014168ed4966fecd07f3d7a1d4828ae63 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_dfm.py @@ -0,0 +1,951 @@ +# +# sympy.polys.matrices.dfm +# +# This modules defines the DFM class which is a wrapper for dense flint +# matrices as found in python-flint. +# +# As of python-flint 0.4.1 matrices over the following domains can be supported +# by python-flint: +# +# ZZ: flint.fmpz_mat +# QQ: flint.fmpq_mat +# GF(p): flint.nmod_mat (p prime and p < ~2**62) +# +# The underlying flint library has many more domains, but these are not yet +# supported by python-flint. +# +# The DFM class is a wrapper for the flint matrices and provides a common +# interface for all supported domains that is interchangeable with the DDM +# and SDM classes so that DomainMatrix can be used with any as its internal +# matrix representation. +# + +# TODO: +# +# Implement the following methods that are provided by python-flint: +# +# - hnf (Hermite normal form) +# - snf (Smith normal form) +# - minpoly +# - is_hnf +# - is_snf +# - rank +# +# The other types DDM and SDM do not have these methods and the algorithms +# for hnf, snf and rank are already implemented. Algorithms for minpoly, +# is_hnf and is_snf would need to be added. +# +# Add more methods to python-flint to expose more of Flint's functionality +# and also to make some of the above methods simpler or more efficient e.g. +# slicing, fancy indexing etc. + +from sympy.external.gmpy import GROUND_TYPES +from sympy.external.importtools import import_module +from sympy.utilities.decorator import doctest_depends_on + +from sympy.polys.domains import ZZ, QQ + +from .exceptions import ( + DMBadInputError, + DMDomainError, + DMNonSquareMatrixError, + DMNonInvertibleMatrixError, + DMRankError, + DMShapeError, + DMValueError, +) + + +if GROUND_TYPES != 'flint': + __doctest_skip__ = ['*'] + + +flint = import_module('flint') + + +__all__ = ['DFM'] + + +@doctest_depends_on(ground_types=['flint']) +class DFM: + """ + Dense FLINT matrix. This class is a wrapper for matrices from python-flint. + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.matrices.dfm import DFM + >>> dfm = DFM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> dfm + [[1, 2], [3, 4]] + >>> dfm.rep + [1, 2] + [3, 4] + >>> type(dfm.rep) # doctest: +SKIP + + + Usually, the DFM class is not instantiated directly, but is created as the + internal representation of :class:`~.DomainMatrix`. When + `SYMPY_GROUND_TYPES` is set to `flint` and `python-flint` is installed, the + :class:`DFM` class is used automatically as the internal representation of + :class:`~.DomainMatrix` in dense format if the domain is supported by + python-flint. + + >>> from sympy.polys.matrices.domainmatrix import DM + >>> dM = DM([[1, 2], [3, 4]], ZZ) + >>> dM.rep + [[1, 2], [3, 4]] + + A :class:`~.DomainMatrix` can be converted to :class:`DFM` by calling the + :meth:`to_dfm` method: + + >>> dM.to_dfm() + [[1, 2], [3, 4]] + + """ + + fmt = 'dense' + is_DFM = True + is_DDM = False + + def __new__(cls, rowslist, shape, domain): + """Construct from a nested list.""" + flint_mat = cls._get_flint_func(domain) + + if 0 not in shape: + try: + rep = flint_mat(rowslist) + except (ValueError, TypeError): + raise DMBadInputError(f"Input should be a list of list of {domain}") + else: + rep = flint_mat(*shape) + + return cls._new(rep, shape, domain) + + @classmethod + def _new(cls, rep, shape, domain): + """Internal constructor from a flint matrix.""" + cls._check(rep, shape, domain) + obj = object.__new__(cls) + obj.rep = rep + obj.shape = obj.rows, obj.cols = shape + obj.domain = domain + return obj + + def _new_rep(self, rep): + """Create a new DFM with the same shape and domain but a new rep.""" + return self._new(rep, self.shape, self.domain) + + @classmethod + def _check(cls, rep, shape, domain): + repshape = (rep.nrows(), rep.ncols()) + if repshape != shape: + raise DMBadInputError("Shape of rep does not match shape of DFM") + if domain == ZZ and not isinstance(rep, flint.fmpz_mat): + raise RuntimeError("Rep is not a flint.fmpz_mat") + elif domain == QQ and not isinstance(rep, flint.fmpq_mat): + raise RuntimeError("Rep is not a flint.fmpq_mat") + elif domain.is_FF and not isinstance(rep, (flint.fmpz_mod_mat, flint.nmod_mat)): + raise RuntimeError("Rep is not a flint.fmpz_mod_mat or flint.nmod_mat") + elif domain not in (ZZ, QQ) and not domain.is_FF: + raise NotImplementedError("Only ZZ and QQ are supported by DFM") + + @classmethod + def _supports_domain(cls, domain): + """Return True if the given domain is supported by DFM.""" + return domain in (ZZ, QQ) or domain.is_FF and domain._is_flint + + @classmethod + def _get_flint_func(cls, domain): + """Return the flint matrix class for the given domain.""" + if domain == ZZ: + return flint.fmpz_mat + elif domain == QQ: + return flint.fmpq_mat + elif domain.is_FF: + c = domain.characteristic() + if isinstance(domain.one, flint.nmod): + _cls = flint.nmod_mat + def _func(*e): + if len(e) == 1 and isinstance(e[0], flint.nmod_mat): + return _cls(e[0]) + else: + return _cls(*e, c) + else: + m = flint.fmpz_mod_ctx(c) + _func = lambda *e: flint.fmpz_mod_mat(*e, m) + return _func + else: + raise NotImplementedError("Only ZZ and QQ are supported by DFM") + + @property + def _func(self): + """Callable to create a flint matrix of the same domain.""" + return self._get_flint_func(self.domain) + + def __str__(self): + """Return ``str(self)``.""" + return str(self.to_ddm()) + + def __repr__(self): + """Return ``repr(self)``.""" + return f'DFM{repr(self.to_ddm())[3:]}' + + def __eq__(self, other): + """Return ``self == other``.""" + if not isinstance(other, DFM): + return NotImplemented + # Compare domains first because we do *not* want matrices with + # different domains to be equal but e.g. a flint fmpz_mat and fmpq_mat + # with the same entries will compare equal. + return self.domain == other.domain and self.rep == other.rep + + @classmethod + def from_list(cls, rowslist, shape, domain): + """Construct from a nested list.""" + return cls(rowslist, shape, domain) + + def to_list(self): + """Convert to a nested list.""" + return self.rep.tolist() + + def copy(self): + """Return a copy of self.""" + return self._new_rep(self._func(self.rep)) + + def to_ddm(self): + """Convert to a DDM.""" + return DDM.from_list(self.to_list(), self.shape, self.domain) + + def to_sdm(self): + """Convert to a SDM.""" + return SDM.from_list(self.to_list(), self.shape, self.domain) + + def to_dfm(self): + """Return self.""" + return self + + def to_dfm_or_ddm(self): + """ + Convert to a :class:`DFM`. + + This :class:`DFM` method exists to parallel the :class:`~.DDM` and + :class:`~.SDM` methods. For :class:`DFM` it will always return self. + + See Also + ======== + + to_ddm + to_sdm + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dfm_or_ddm + """ + return self + + @classmethod + def from_ddm(cls, ddm): + """Convert from a DDM.""" + return cls.from_list(ddm.to_list(), ddm.shape, ddm.domain) + + @classmethod + def from_list_flat(cls, elements, shape, domain): + """Inverse of :meth:`to_list_flat`.""" + func = cls._get_flint_func(domain) + try: + rep = func(*shape, elements) + except ValueError: + raise DMBadInputError(f"Incorrect number of elements for shape {shape}") + except TypeError: + raise DMBadInputError(f"Input should be a list of {domain}") + return cls(rep, shape, domain) + + def to_list_flat(self): + """Convert to a flat list.""" + return self.rep.entries() + + def to_flat_nz(self): + """Convert to a flat list of non-zeros.""" + return self.to_ddm().to_flat_nz() + + @classmethod + def from_flat_nz(cls, elements, data, domain): + """Inverse of :meth:`to_flat_nz`.""" + return DDM.from_flat_nz(elements, data, domain).to_dfm() + + def to_dod(self): + """Convert to a DOD.""" + return self.to_ddm().to_dod() + + @classmethod + def from_dod(cls, dod, shape, domain): + """Inverse of :meth:`to_dod`.""" + return DDM.from_dod(dod, shape, domain).to_dfm() + + def to_dok(self): + """Convert to a DOK.""" + return self.to_ddm().to_dok() + + @classmethod + def from_dok(cls, dok, shape, domain): + """Inverse of :math:`to_dod`.""" + return DDM.from_dok(dok, shape, domain).to_dfm() + + def iter_values(self): + """Iterate over the non-zero values of the matrix.""" + m, n = self.shape + rep = self.rep + for i in range(m): + for j in range(n): + repij = rep[i, j] + if repij: + yield rep[i, j] + + def iter_items(self): + """Iterate over indices and values of nonzero elements of the matrix.""" + m, n = self.shape + rep = self.rep + for i in range(m): + for j in range(n): + repij = rep[i, j] + if repij: + yield ((i, j), repij) + + def convert_to(self, domain): + """Convert to a new domain.""" + if domain == self.domain: + return self.copy() + elif domain == QQ and self.domain == ZZ: + return self._new(flint.fmpq_mat(self.rep), self.shape, domain) + elif self._supports_domain(domain): + # XXX: Use more efficient conversions when possible. + return self.to_ddm().convert_to(domain).to_dfm() + else: + # It is the callers responsibility to convert to DDM before calling + # this method if the domain is not supported by DFM. + raise NotImplementedError("Only ZZ and QQ are supported by DFM") + + def getitem(self, i, j): + """Get the ``(i, j)``-th entry.""" + # XXX: flint matrices do not support negative indices + # XXX: They also raise ValueError instead of IndexError + m, n = self.shape + if i < 0: + i += m + if j < 0: + j += n + try: + return self.rep[i, j] + except ValueError: + raise IndexError(f"Invalid indices ({i}, {j}) for Matrix of shape {self.shape}") + + def setitem(self, i, j, value): + """Set the ``(i, j)``-th entry.""" + # XXX: flint matrices do not support negative indices + # XXX: They also raise ValueError instead of IndexError + m, n = self.shape + if i < 0: + i += m + if j < 0: + j += n + try: + self.rep[i, j] = value + except ValueError: + raise IndexError(f"Invalid indices ({i}, {j}) for Matrix of shape {self.shape}") + + def _extract(self, i_indices, j_indices): + """Extract a submatrix with no checking.""" + # Indices must be positive and in range. + M = self.rep + lol = [[M[i, j] for j in j_indices] for i in i_indices] + shape = (len(i_indices), len(j_indices)) + return self.from_list(lol, shape, self.domain) + + def extract(self, rowslist, colslist): + """Extract a submatrix.""" + # XXX: flint matrices do not support fancy indexing or negative indices + # + # Check and convert negative indices before calling _extract. + m, n = self.shape + + new_rows = [] + new_cols = [] + + for i in rowslist: + if i < 0: + i_pos = i + m + else: + i_pos = i + if not 0 <= i_pos < m: + raise IndexError(f"Invalid row index {i} for Matrix of shape {self.shape}") + new_rows.append(i_pos) + + for j in colslist: + if j < 0: + j_pos = j + n + else: + j_pos = j + if not 0 <= j_pos < n: + raise IndexError(f"Invalid column index {j} for Matrix of shape {self.shape}") + new_cols.append(j_pos) + + return self._extract(new_rows, new_cols) + + def extract_slice(self, rowslice, colslice): + """Slice a DFM.""" + # XXX: flint matrices do not support slicing + m, n = self.shape + i_indices = range(m)[rowslice] + j_indices = range(n)[colslice] + return self._extract(i_indices, j_indices) + + def neg(self): + """Negate a DFM matrix.""" + return self._new_rep(-self.rep) + + def add(self, other): + """Add two DFM matrices.""" + return self._new_rep(self.rep + other.rep) + + def sub(self, other): + """Subtract two DFM matrices.""" + return self._new_rep(self.rep - other.rep) + + def mul(self, other): + """Multiply a DFM matrix from the right by a scalar.""" + return self._new_rep(self.rep * other) + + def rmul(self, other): + """Multiply a DFM matrix from the left by a scalar.""" + return self._new_rep(other * self.rep) + + def mul_elementwise(self, other): + """Elementwise multiplication of two DFM matrices.""" + # XXX: flint matrices do not support elementwise multiplication + return self.to_ddm().mul_elementwise(other.to_ddm()).to_dfm() + + def matmul(self, other): + """Multiply two DFM matrices.""" + shape = (self.rows, other.cols) + return self._new(self.rep * other.rep, shape, self.domain) + + # XXX: For the most part DomainMatrix does not expect DDM, SDM, or DFM to + # have arithmetic operators defined. The only exception is negation. + # Perhaps that should be removed. + + def __neg__(self): + """Negate a DFM matrix.""" + return self.neg() + + @classmethod + def zeros(cls, shape, domain): + """Return a zero DFM matrix.""" + func = cls._get_flint_func(domain) + return cls._new(func(*shape), shape, domain) + + # XXX: flint matrices do not have anything like ones or eye + # In the methods below we convert to DDM and then back to DFM which is + # probably about as efficient as implementing these methods directly. + + @classmethod + def ones(cls, shape, domain): + """Return a one DFM matrix.""" + # XXX: flint matrices do not have anything like ones + return DDM.ones(shape, domain).to_dfm() + + @classmethod + def eye(cls, n, domain): + """Return the identity matrix of size n.""" + # XXX: flint matrices do not have anything like eye + return DDM.eye(n, domain).to_dfm() + + @classmethod + def diag(cls, elements, domain): + """Return a diagonal matrix.""" + return DDM.diag(elements, domain).to_dfm() + + def applyfunc(self, func, domain): + """Apply a function to each entry of a DFM matrix.""" + return self.to_ddm().applyfunc(func, domain).to_dfm() + + def transpose(self): + """Transpose a DFM matrix.""" + return self._new(self.rep.transpose(), (self.cols, self.rows), self.domain) + + def hstack(self, *others): + """Horizontally stack matrices.""" + return self.to_ddm().hstack(*[o.to_ddm() for o in others]).to_dfm() + + def vstack(self, *others): + """Vertically stack matrices.""" + return self.to_ddm().vstack(*[o.to_ddm() for o in others]).to_dfm() + + def diagonal(self): + """Return the diagonal of a DFM matrix.""" + M = self.rep + m, n = self.shape + return [M[i, i] for i in range(min(m, n))] + + def is_upper(self): + """Return ``True`` if the matrix is upper triangular.""" + M = self.rep + for i in range(self.rows): + for j in range(min(i, self.cols)): + if M[i, j]: + return False + return True + + def is_lower(self): + """Return ``True`` if the matrix is lower triangular.""" + M = self.rep + for i in range(self.rows): + for j in range(i + 1, self.cols): + if M[i, j]: + return False + return True + + def is_diagonal(self): + """Return ``True`` if the matrix is diagonal.""" + return self.is_upper() and self.is_lower() + + def is_zero_matrix(self): + """Return ``True`` if the matrix is the zero matrix.""" + M = self.rep + for i in range(self.rows): + for j in range(self.cols): + if M[i, j]: + return False + return True + + def nnz(self): + """Return the number of non-zero elements in the matrix.""" + return self.to_ddm().nnz() + + def scc(self): + """Return the strongly connected components of the matrix.""" + return self.to_ddm().scc() + + @doctest_depends_on(ground_types='flint') + def det(self): + """ + Compute the determinant of the matrix using FLINT. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2], [3, 4]]) + >>> dfm = M.to_DM().to_dfm() + >>> dfm + [[1, 2], [3, 4]] + >>> dfm.det() + -2 + + Notes + ===== + + Calls the ``.det()`` method of the underlying FLINT matrix. + + For :ref:`ZZ` or :ref:`QQ` this calls ``fmpz_mat_det`` or + ``fmpq_mat_det`` respectively. + + At the time of writing the implementation of ``fmpz_mat_det`` uses one + of several algorithms depending on the size of the matrix and bit size + of the entries. The algorithms used are: + + - Cofactor for very small (up to 4x4) matrices. + - Bareiss for small (up to 25x25) matrices. + - Modular algorithms for larger matrices (up to 60x60) or for larger + matrices with large bit sizes. + - Modular "accelerated" for larger matrices (60x60 upwards) if the bit + size is smaller than the dimensions of the matrix. + + The implementation of ``fmpq_mat_det`` clears denominators from each + row (not the whole matrix) and then calls ``fmpz_mat_det`` and divides + by the product of the denominators. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.det + Higher level interface to compute the determinant of a matrix. + """ + # XXX: At least the first three algorithms described above should also + # be implemented in the pure Python DDM and SDM classes which at the + # time of writng just use Bareiss for all matrices and domains. + # Probably in Python the thresholds would be different though. + return self.rep.det() + + @doctest_depends_on(ground_types='flint') + def charpoly(self): + """ + Compute the characteristic polynomial of the matrix using FLINT. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2], [3, 4]]) + >>> dfm = M.to_DM().to_dfm() # need ground types = 'flint' + >>> dfm + [[1, 2], [3, 4]] + >>> dfm.charpoly() + [1, -5, -2] + + Notes + ===== + + Calls the ``.charpoly()`` method of the underlying FLINT matrix. + + For :ref:`ZZ` or :ref:`QQ` this calls ``fmpz_mat_charpoly`` or + ``fmpq_mat_charpoly`` respectively. + + At the time of writing the implementation of ``fmpq_mat_charpoly`` + clears a denominator from the whole matrix and then calls + ``fmpz_mat_charpoly``. The coefficients of the characteristic + polynomial are then multiplied by powers of the denominator. + + The ``fmpz_mat_charpoly`` method uses a modular algorithm with CRT + reconstruction. The modular algorithm uses ``nmod_mat_charpoly`` which + uses Berkowitz for small matrices and non-prime moduli or otherwise + the Danilevsky method. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.charpoly + Higher level interface to compute the characteristic polynomial of + a matrix. + """ + # FLINT polynomial coefficients are in reverse order compared to SymPy. + return self.rep.charpoly().coeffs()[::-1] + + @doctest_depends_on(ground_types='flint') + def inv(self): + """ + Compute the inverse of a matrix using FLINT. + + Examples + ======== + + >>> from sympy import Matrix, QQ + >>> M = Matrix([[1, 2], [3, 4]]) + >>> dfm = M.to_DM().to_dfm().convert_to(QQ) + >>> dfm + [[1, 2], [3, 4]] + >>> dfm.inv() + [[-2, 1], [3/2, -1/2]] + >>> dfm.matmul(dfm.inv()) + [[1, 0], [0, 1]] + + Notes + ===== + + Calls the ``.inv()`` method of the underlying FLINT matrix. + + For now this will raise an error if the domain is :ref:`ZZ` but will + use the FLINT method for :ref:`QQ`. + + The FLINT methods for :ref:`ZZ` and :ref:`QQ` are ``fmpz_mat_inv`` and + ``fmpq_mat_inv`` respectively. The ``fmpz_mat_inv`` method computes an + inverse with denominator. This is implemented by calling + ``fmpz_mat_solve`` (see notes in :meth:`lu_solve` about the algorithm). + + The ``fmpq_mat_inv`` method clears denominators from each row and then + multiplies those into the rhs identity matrix before calling + ``fmpz_mat_solve``. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.inv + Higher level method for computing the inverse of a matrix. + """ + # TODO: Implement similar algorithms for DDM and SDM. + # + # XXX: The flint fmpz_mat and fmpq_mat inv methods both return fmpq_mat + # by default. The fmpz_mat method has an optional argument to return + # fmpz_mat instead for unimodular matrices. + # + # The convention in DomainMatrix is to raise an error if the matrix is + # not over a field regardless of whether the matrix is invertible over + # its domain or over any associated field. Maybe DomainMatrix.inv + # should be changed to always return a matrix over an associated field + # except with a unimodular argument for returning an inverse over a + # ring if possible. + # + # For now we follow the existing DomainMatrix convention... + K = self.domain + m, n = self.shape + + if m != n: + raise DMNonSquareMatrixError("cannot invert a non-square matrix") + + if K == ZZ: + raise DMDomainError("field expected, got %s" % K) + elif K == QQ or K.is_FF: + try: + return self._new_rep(self.rep.inv()) + except ZeroDivisionError: + raise DMNonInvertibleMatrixError("matrix is not invertible") + else: + # If more domains are added for DFM then we will need to consider + # what happens here. + raise NotImplementedError("DFM.inv() is not implemented for %s" % K) + + def lu(self): + """Return the LU decomposition of the matrix.""" + L, U, swaps = self.to_ddm().lu() + return L.to_dfm(), U.to_dfm(), swaps + + def qr(self): + """Return the QR decomposition of the matrix.""" + Q, R = self.to_ddm().qr() + return Q.to_dfm(), R.to_dfm() + + # XXX: The lu_solve function should be renamed to solve. Whether or not it + # uses an LU decomposition is an implementation detail. A method called + # lu_solve would make sense for a situation in which an LU decomposition is + # reused several times to solve with different rhs but that would imply a + # different call signature. + # + # The underlying python-flint method has an algorithm= argument so we could + # use that and have e.g. solve_lu and solve_modular or perhaps also a + # method= argument to choose between the two. Flint itself has more + # possible algorithms to choose from than are exposed by python-flint. + + @doctest_depends_on(ground_types='flint') + def lu_solve(self, rhs): + """ + Solve a matrix equation using FLINT. + + Examples + ======== + + >>> from sympy import Matrix, QQ + >>> M = Matrix([[1, 2], [3, 4]]) + >>> dfm = M.to_DM().to_dfm().convert_to(QQ) + >>> dfm + [[1, 2], [3, 4]] + >>> rhs = Matrix([1, 2]).to_DM().to_dfm().convert_to(QQ) + >>> dfm.lu_solve(rhs) + [[0], [1/2]] + + Notes + ===== + + Calls the ``.solve()`` method of the underlying FLINT matrix. + + For now this will raise an error if the domain is :ref:`ZZ` but will + use the FLINT method for :ref:`QQ`. + + The FLINT methods for :ref:`ZZ` and :ref:`QQ` are ``fmpz_mat_solve`` + and ``fmpq_mat_solve`` respectively. The ``fmpq_mat_solve`` method + uses one of two algorithms: + + - For small matrices (<25 rows) it clears denominators between the + matrix and rhs and uses ``fmpz_mat_solve``. + - For larger matrices it uses ``fmpq_mat_solve_dixon`` which is a + modular approach with CRT reconstruction over :ref:`QQ`. + + The ``fmpz_mat_solve`` method uses one of four algorithms: + + - For very small (<= 3x3) matrices it uses a Cramer's rule. + - For small (<= 15x15) matrices it uses a fraction-free LU solve. + - Otherwise it uses either Dixon or another multimodular approach. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.lu_solve + Higher level interface to solve a matrix equation. + """ + if not self.domain == rhs.domain: + raise DMDomainError("Domains must match: %s != %s" % (self.domain, rhs.domain)) + + # XXX: As for inv we should consider whether to return a matrix over + # over an associated field or attempt to find a solution in the ring. + # For now we follow the existing DomainMatrix convention... + if not self.domain.is_Field: + raise DMDomainError("Field expected, got %s" % self.domain) + + m, n = self.shape + j, k = rhs.shape + if m != j: + raise DMShapeError("Matrix size mismatch: %s * %s vs %s * %s" % (m, n, j, k)) + sol_shape = (n, k) + + # XXX: The Flint solve method only handles square matrices. Probably + # Flint has functions that could be used to solve non-square systems + # but they are not exposed in python-flint yet. Alternatively we could + # put something here using the features that are available like rref. + if m != n: + return self.to_ddm().lu_solve(rhs.to_ddm()).to_dfm() + + try: + sol = self.rep.solve(rhs.rep) + except ZeroDivisionError: + raise DMNonInvertibleMatrixError("Matrix det == 0; not invertible.") + + return self._new(sol, sol_shape, self.domain) + + def fflu(self): + """ + Fraction-free LU decomposition of DFM. + + Explanation + =========== + + Uses `python-flint` if possible for a matrix of + integers otherwise uses the DDM method. + + See Also + ======== + + sympy.polys.matrices.ddm.DDM.fflu + """ + if self.domain == ZZ: + fflu = getattr(self.rep, 'fflu', None) + if fflu is not None: + P, L, D, U = self.rep.fflu() + m, n = self.shape + return ( + self._new(P, (m, m), self.domain), + self._new(L, (m, m), self.domain), + self._new(D, (m, m), self.domain), + self._new(U, self.shape, self.domain) + ) + ddm_p, ddm_l, ddm_d, ddm_u = self.to_ddm().fflu() + P = ddm_p.to_dfm() + L = ddm_l.to_dfm() + D = ddm_d.to_dfm() + U = ddm_u.to_dfm() + return P, L, D, U + + def nullspace(self): + """Return a basis for the nullspace of the matrix.""" + # Code to compute nullspace using flint: + # + # V, nullity = self.rep.nullspace() + # V_dfm = self._new_rep(V)._extract(range(self.rows), range(nullity)) + # + # XXX: That gives the nullspace but does not give us nonpivots. So we + # use the slower DDM method anyway. It would be better to change the + # signature of the nullspace method to not return nonpivots. + # + # XXX: Also python-flint exposes a nullspace method for fmpz_mat but + # not for fmpq_mat. This is the reverse of the situation for DDM etc + # which only allow nullspace over a field. The nullspace method for + # DDM, SDM etc should be changed to allow nullspace over ZZ as well. + # The DomainMatrix nullspace method does allow the domain to be a ring + # but does not directly call the lower-level nullspace methods and uses + # rref_den instead. Nullspace methods should also be added to all + # matrix types in python-flint. + ddm, nonpivots = self.to_ddm().nullspace() + return ddm.to_dfm(), nonpivots + + def nullspace_from_rref(self, pivots=None): + """Return a basis for the nullspace of the matrix.""" + # XXX: Use the flint nullspace method!!! + sdm, nonpivots = self.to_sdm().nullspace_from_rref(pivots=pivots) + return sdm.to_dfm(), nonpivots + + def particular(self): + """Return a particular solution to the system.""" + return self.to_ddm().particular().to_dfm() + + def _lll(self, transform=False, delta=0.99, eta=0.51, rep='zbasis', gram='approx'): + """Call the fmpz_mat.lll() method but check rank to avoid segfaults.""" + + # XXX: There are tests that pass e.g. QQ(5,6) for delta. That fails + # with a TypeError in flint because if QQ is fmpq then conversion with + # float fails. We handle that here but there are two better fixes: + # + # - Make python-flint's fmpq convert with float(x) + # - Change the tests because delta should just be a float. + + def to_float(x): + if QQ.of_type(x): + return float(x.numerator) / float(x.denominator) + else: + return float(x) + + delta = to_float(delta) + eta = to_float(eta) + + if not 0.25 < delta < 1: + raise DMValueError("delta must be between 0.25 and 1") + + # XXX: The flint lll method segfaults if the matrix is not full rank. + m, n = self.shape + if self.rep.rank() != m: + raise DMRankError("Matrix must have full row rank for Flint LLL.") + + # Actually call the flint method. + return self.rep.lll(transform=transform, delta=delta, eta=eta, rep=rep, gram=gram) + + @doctest_depends_on(ground_types='flint') + def lll(self, delta=0.75): + """Compute LLL-reduced basis using FLINT. + + See :meth:`lll_transform` for more information. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2, 3], [4, 5, 6]]) + >>> M.to_DM().to_dfm().lll() + [[2, 1, 0], [-1, 1, 3]] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.lll + Higher level interface to compute LLL-reduced basis. + lll_transform + Compute LLL-reduced basis and transform matrix. + """ + if self.domain != ZZ: + raise DMDomainError("ZZ expected, got %s" % self.domain) + elif self.rows > self.cols: + raise DMShapeError("Matrix must not have more rows than columns.") + + rep = self._lll(delta=delta) + return self._new_rep(rep) + + @doctest_depends_on(ground_types='flint') + def lll_transform(self, delta=0.75): + """Compute LLL-reduced basis and transform using FLINT. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2, 3], [4, 5, 6]]).to_DM().to_dfm() + >>> M_lll, T = M.lll_transform() + >>> M_lll + [[2, 1, 0], [-1, 1, 3]] + >>> T + [[-2, 1], [3, -1]] + >>> T.matmul(M) == M_lll + True + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.lll + Higher level interface to compute LLL-reduced basis. + lll + Compute LLL-reduced basis without transform matrix. + """ + if self.domain != ZZ: + raise DMDomainError("ZZ expected, got %s" % self.domain) + elif self.rows > self.cols: + raise DMShapeError("Matrix must not have more rows than columns.") + + rep, T = self._lll(transform=True, delta=delta) + basis = self._new_rep(rep) + T_dfm = self._new(T, (self.rows, self.rows), self.domain) + return basis, T_dfm + + +# Avoid circular imports +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.ddm import SDM diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_typing.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_typing.py new file mode 100644 index 0000000000000000000000000000000000000000..fc7c3b601fe85d591ddf853acbf33f5bba64b11c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/_typing.py @@ -0,0 +1,16 @@ +from typing import TypeVar, Protocol + + +T = TypeVar('T') + + +class RingElement(Protocol): + """A ring element. + + Must support ``+``, ``-``, ``*``, ``**`` and ``-``. + """ + def __add__(self: T, other: T, /) -> T: ... + def __sub__(self: T, other: T, /) -> T: ... + def __mul__(self: T, other: T, /) -> T: ... + def __pow__(self: T, other: int, /) -> T: ... + def __neg__(self: T, /) -> T: ... diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/ddm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/ddm.py new file mode 100644 index 0000000000000000000000000000000000000000..9b7836ef298fe27a1c02ed069f33711a632d6ed8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/ddm.py @@ -0,0 +1,1176 @@ +""" + +Module for the DDM class. + +The DDM class is an internal representation used by DomainMatrix. The letters +DDM stand for Dense Domain Matrix. A DDM instance represents a matrix using +elements from a polynomial Domain (e.g. ZZ, QQ, ...) in a dense-matrix +representation. + +Basic usage: + + >>> from sympy import ZZ, QQ + >>> from sympy.polys.matrices.ddm import DDM + >>> A = DDM([[ZZ(0), ZZ(1)], [ZZ(-1), ZZ(0)]], (2, 2), ZZ) + >>> A.shape + (2, 2) + >>> A + [[0, 1], [-1, 0]] + >>> type(A) + + >>> A @ A + [[-1, 0], [0, -1]] + +The ddm_* functions are designed to operate on DDM as well as on an ordinary +list of lists: + + >>> from sympy.polys.matrices.dense import ddm_idet + >>> ddm_idet(A, QQ) + 1 + >>> ddm_idet([[0, 1], [-1, 0]], QQ) + 1 + >>> A + [[-1, 0], [0, -1]] + +Note that ddm_idet modifies the input matrix in-place. It is recommended to +use the DDM.det method as a friendlier interface to this instead which takes +care of copying the matrix: + + >>> B = DDM([[ZZ(0), ZZ(1)], [ZZ(-1), ZZ(0)]], (2, 2), ZZ) + >>> B.det() + 1 + +Normally DDM would not be used directly and is just part of the internal +representation of DomainMatrix which adds further functionality including e.g. +unifying domains. + +The dense format used by DDM is a list of lists of elements e.g. the 2x2 +identity matrix is like [[1, 0], [0, 1]]. The DDM class itself is a subclass +of list and its list items are plain lists. Elements are accessed as e.g. +ddm[i][j] where ddm[i] gives the ith row and ddm[i][j] gets the element in the +jth column of that row. Subclassing list makes e.g. iteration and indexing +very efficient. We do not override __getitem__ because it would lose that +benefit. + +The core routines are implemented by the ddm_* functions defined in dense.py. +Those functions are intended to be able to operate on a raw list-of-lists +representation of matrices with most functions operating in-place. The DDM +class takes care of copying etc and also stores a Domain object associated +with its elements. This makes it possible to implement things like A + B with +domain checking and also shape checking so that the list of lists +representation is friendlier. + +""" +from itertools import chain + +from sympy.external.gmpy import GROUND_TYPES +from sympy.utilities.decorator import doctest_depends_on + +from .exceptions import ( + DMBadInputError, + DMDomainError, + DMNonSquareMatrixError, + DMShapeError, +) + +from sympy.polys.domains import QQ + +from .dense import ( + ddm_transpose, + ddm_iadd, + ddm_isub, + ddm_ineg, + ddm_imul, + ddm_irmul, + ddm_imatmul, + ddm_irref, + ddm_irref_den, + ddm_idet, + ddm_iinv, + ddm_ilu_split, + ddm_ilu_solve, + ddm_berk, + ) + +from .lll import ddm_lll, ddm_lll_transform + + +if GROUND_TYPES != 'flint': + __doctest_skip__ = ['DDM.to_dfm', 'DDM.to_dfm_or_ddm'] + + +class DDM(list): + """Dense matrix based on polys domain elements + + This is a list subclass and is a wrapper for a list of lists that supports + basic matrix arithmetic +, -, *, **. + """ + + fmt = 'dense' + is_DFM = False + is_DDM = True + + def __init__(self, rowslist, shape, domain): + if not (isinstance(rowslist, list) and all(type(row) is list for row in rowslist)): + raise DMBadInputError("rowslist must be a list of lists") + m, n = shape + if len(rowslist) != m or any(len(row) != n for row in rowslist): + raise DMBadInputError("Inconsistent row-list/shape") + + super().__init__([i.copy() for i in rowslist]) + self.shape = (m, n) + self.rows = m + self.cols = n + self.domain = domain + + def getitem(self, i, j): + return self[i][j] + + def setitem(self, i, j, value): + self[i][j] = value + + def extract_slice(self, slice1, slice2): + ddm = [row[slice2] for row in self[slice1]] + rows = len(ddm) + cols = len(ddm[0]) if ddm else len(range(self.shape[1])[slice2]) + return DDM(ddm, (rows, cols), self.domain) + + def extract(self, rows, cols): + ddm = [] + for i in rows: + rowi = self[i] + ddm.append([rowi[j] for j in cols]) + return DDM(ddm, (len(rows), len(cols)), self.domain) + + @classmethod + def from_list(cls, rowslist, shape, domain): + """ + Create a :class:`DDM` from a list of lists. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.ddm import DDM + >>> A = DDM.from_list([[ZZ(0), ZZ(1)], [ZZ(-1), ZZ(0)]], (2, 2), ZZ) + >>> A + [[0, 1], [-1, 0]] + >>> A == DDM([[ZZ(0), ZZ(1)], [ZZ(-1), ZZ(0)]], (2, 2), ZZ) + True + + See Also + ======== + + from_list_flat + """ + return cls(rowslist, shape, domain) + + @classmethod + def from_ddm(cls, other): + return other.copy() + + def to_list(self): + """ + Convert to a list of lists. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.ddm import DDM + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_list() + [[1, 2], [3, 4]] + + See Also + ======== + + to_list_flat + sympy.polys.matrices.domainmatrix.DomainMatrix.to_list + """ + return [row[:] for row in self] + + def to_list_flat(self): + """ + Convert to a flat list of elements. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.ddm import DDM + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_list_flat() + [1, 2, 3, 4] + >>> A == DDM.from_list_flat(A.to_list_flat(), A.shape, A.domain) + True + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.to_list_flat + """ + flat = [] + for row in self: + flat.extend(row) + return flat + + @classmethod + def from_list_flat(cls, flat, shape, domain): + """ + Create a :class:`DDM` from a flat list of elements. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.ddm import DDM + >>> A = DDM.from_list_flat([1, 2, 3, 4], (2, 2), QQ) + >>> A + [[1, 2], [3, 4]] + >>> A == DDM.from_list_flat(A.to_list_flat(), A.shape, A.domain) + True + + See Also + ======== + + to_list_flat + sympy.polys.matrices.domainmatrix.DomainMatrix.from_list_flat + """ + assert type(flat) is list + rows, cols = shape + if not (len(flat) == rows*cols): + raise DMBadInputError("Inconsistent flat-list shape") + lol = [flat[i*cols:(i+1)*cols] for i in range(rows)] + return cls(lol, shape, domain) + + def flatiter(self): + return chain.from_iterable(self) + + def flat(self): + items = [] + for row in self: + items.extend(row) + return items + + def to_flat_nz(self): + """ + Convert to a flat list of nonzero elements and data. + + Explanation + =========== + + This is used to operate on a list of the elements of a matrix and then + reconstruct a matrix using :meth:`from_flat_nz`. Zero elements are + included in the list but that may change in the future. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> elements, data = A.to_flat_nz() + >>> elements + [1, 2, 3, 4] + >>> A == DDM.from_flat_nz(elements, data, A.domain) + True + + See Also + ======== + + from_flat_nz + sympy.polys.matrices.sdm.SDM.to_flat_nz + sympy.polys.matrices.domainmatrix.DomainMatrix.to_flat_nz + """ + return self.to_sdm().to_flat_nz() + + @classmethod + def from_flat_nz(cls, elements, data, domain): + """ + Reconstruct a :class:`DDM` after calling :meth:`to_flat_nz`. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> elements, data = A.to_flat_nz() + >>> elements + [1, 2, 3, 4] + >>> A == DDM.from_flat_nz(elements, data, A.domain) + True + + See Also + ======== + + to_flat_nz + sympy.polys.matrices.sdm.SDM.from_flat_nz + sympy.polys.matrices.domainmatrix.DomainMatrix.from_flat_nz + """ + return SDM.from_flat_nz(elements, data, domain).to_ddm() + + def to_dod(self): + """ + Convert to a dictionary of dictionaries (dod) format. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_dod() + {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}} + + See Also + ======== + + from_dod + sympy.polys.matrices.sdm.SDM.to_dod + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dod + """ + dod = {} + for i, row in enumerate(self): + row = {j:e for j, e in enumerate(row) if e} + if row: + dod[i] = row + return dod + + @classmethod + def from_dod(cls, dod, shape, domain): + """ + Create a :class:`DDM` from a dictionary of dictionaries (dod) format. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> dod = {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}} + >>> A = DDM.from_dod(dod, (2, 2), QQ) + >>> A + [[1, 2], [3, 4]] + + See Also + ======== + + to_dod + sympy.polys.matrices.sdm.SDM.from_dod + sympy.polys.matrices.domainmatrix.DomainMatrix.from_dod + """ + rows, cols = shape + lol = [[domain.zero] * cols for _ in range(rows)] + for i, row in dod.items(): + for j, element in row.items(): + lol[i][j] = element + return DDM(lol, shape, domain) + + def to_dok(self): + """ + Convert :class:`DDM` to dictionary of keys (dok) format. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_dok() + {(0, 0): 1, (0, 1): 2, (1, 0): 3, (1, 1): 4} + + See Also + ======== + + from_dok + sympy.polys.matrices.sdm.SDM.to_dok + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dok + """ + dok = {} + for i, row in enumerate(self): + for j, element in enumerate(row): + if element: + dok[i, j] = element + return dok + + @classmethod + def from_dok(cls, dok, shape, domain): + """ + Create a :class:`DDM` from a dictionary of keys (dok) format. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> dok = {(0, 0): 1, (0, 1): 2, (1, 0): 3, (1, 1): 4} + >>> A = DDM.from_dok(dok, (2, 2), QQ) + >>> A + [[1, 2], [3, 4]] + + See Also + ======== + + to_dok + sympy.polys.matrices.sdm.SDM.from_dok + sympy.polys.matrices.domainmatrix.DomainMatrix.from_dok + """ + rows, cols = shape + lol = [[domain.zero] * cols for _ in range(rows)] + for (i, j), element in dok.items(): + lol[i][j] = element + return DDM(lol, shape, domain) + + def iter_values(self): + """ + Iterate over the non-zero values of the matrix. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[QQ(1), QQ(0)], [QQ(3), QQ(4)]], (2, 2), QQ) + >>> list(A.iter_values()) + [1, 3, 4] + + See Also + ======== + + iter_items + to_list_flat + sympy.polys.matrices.domainmatrix.DomainMatrix.iter_values + """ + for row in self: + yield from filter(None, row) + + def iter_items(self): + """ + Iterate over indices and values of nonzero elements of the matrix. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[QQ(1), QQ(0)], [QQ(3), QQ(4)]], (2, 2), QQ) + >>> list(A.iter_items()) + [((0, 0), 1), ((1, 0), 3), ((1, 1), 4)] + + See Also + ======== + + iter_values + to_dok + sympy.polys.matrices.domainmatrix.DomainMatrix.iter_items + """ + for i, row in enumerate(self): + for j, element in enumerate(row): + if element: + yield (i, j), element + + def to_ddm(self): + """ + Convert to a :class:`DDM`. + + This just returns ``self`` but exists to parallel the corresponding + method in other matrix types like :class:`~.SDM`. + + See Also + ======== + + to_sdm + to_dfm + to_dfm_or_ddm + sympy.polys.matrices.sdm.SDM.to_ddm + sympy.polys.matrices.domainmatrix.DomainMatrix.to_ddm + """ + return self + + def to_sdm(self): + """ + Convert to a :class:`~.SDM`. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_sdm() + {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}} + >>> type(A.to_sdm()) + + + See Also + ======== + + SDM + sympy.polys.matrices.sdm.SDM.to_ddm + """ + return SDM.from_list(self, self.shape, self.domain) + + @doctest_depends_on(ground_types=['flint']) + def to_dfm(self): + """ + Convert to :class:`~.DDM` to :class:`~.DFM`. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_dfm() + [[1, 2], [3, 4]] + >>> type(A.to_dfm()) + + + See Also + ======== + + DFM + sympy.polys.matrices._dfm.DFM.to_ddm + """ + return DFM(list(self), self.shape, self.domain) + + @doctest_depends_on(ground_types=['flint']) + def to_dfm_or_ddm(self): + """ + Convert to :class:`~.DFM` if possible or otherwise return self. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy import QQ + >>> A = DDM([[1, 2], [3, 4]], (2, 2), QQ) + >>> A.to_dfm_or_ddm() + [[1, 2], [3, 4]] + >>> type(A.to_dfm_or_ddm()) + + + See Also + ======== + + to_dfm + to_ddm + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dfm_or_ddm + """ + if DFM._supports_domain(self.domain): + return self.to_dfm() + return self + + def convert_to(self, K): + Kold = self.domain + if K == Kold: + return self.copy() + rows = [[K.convert_from(e, Kold) for e in row] for row in self] + return DDM(rows, self.shape, K) + + def __str__(self): + rowsstr = ['[%s]' % ', '.join(map(str, row)) for row in self] + return '[%s]' % ', '.join(rowsstr) + + def __repr__(self): + cls = type(self).__name__ + rows = list.__repr__(self) + return '%s(%s, %s, %s)' % (cls, rows, self.shape, self.domain) + + def __eq__(self, other): + if not isinstance(other, DDM): + return False + return (super().__eq__(other) and self.domain == other.domain) + + def __ne__(self, other): + return not self.__eq__(other) + + @classmethod + def zeros(cls, shape, domain): + z = domain.zero + m, n = shape + rowslist = [[z] * n for _ in range(m)] + return DDM(rowslist, shape, domain) + + @classmethod + def ones(cls, shape, domain): + one = domain.one + m, n = shape + rowlist = [[one] * n for _ in range(m)] + return DDM(rowlist, shape, domain) + + @classmethod + def eye(cls, size, domain): + if isinstance(size, tuple): + m, n = size + elif isinstance(size, int): + m = n = size + one = domain.one + ddm = cls.zeros((m, n), domain) + for i in range(min(m, n)): + ddm[i][i] = one + return ddm + + def copy(self): + copyrows = [row[:] for row in self] + return DDM(copyrows, self.shape, self.domain) + + def transpose(self): + rows, cols = self.shape + if rows: + ddmT = ddm_transpose(self) + else: + ddmT = [[]] * cols + return DDM(ddmT, (cols, rows), self.domain) + + def __add__(a, b): + if not isinstance(b, DDM): + return NotImplemented + return a.add(b) + + def __sub__(a, b): + if not isinstance(b, DDM): + return NotImplemented + return a.sub(b) + + def __neg__(a): + return a.neg() + + def __mul__(a, b): + if b in a.domain: + return a.mul(b) + else: + return NotImplemented + + def __rmul__(a, b): + if b in a.domain: + return a.mul(b) + else: + return NotImplemented + + def __matmul__(a, b): + if isinstance(b, DDM): + return a.matmul(b) + else: + return NotImplemented + + @classmethod + def _check(cls, a, op, b, ashape, bshape): + if a.domain != b.domain: + msg = "Domain mismatch: %s %s %s" % (a.domain, op, b.domain) + raise DMDomainError(msg) + if ashape != bshape: + msg = "Shape mismatch: %s %s %s" % (a.shape, op, b.shape) + raise DMShapeError(msg) + + def add(a, b): + """a + b""" + a._check(a, '+', b, a.shape, b.shape) + c = a.copy() + ddm_iadd(c, b) + return c + + def sub(a, b): + """a - b""" + a._check(a, '-', b, a.shape, b.shape) + c = a.copy() + ddm_isub(c, b) + return c + + def neg(a): + """-a""" + b = a.copy() + ddm_ineg(b) + return b + + def mul(a, b): + c = a.copy() + ddm_imul(c, b) + return c + + def rmul(a, b): + c = a.copy() + ddm_irmul(c, b) + return c + + def matmul(a, b): + """a @ b (matrix product)""" + m, o = a.shape + o2, n = b.shape + a._check(a, '*', b, o, o2) + c = a.zeros((m, n), a.domain) + ddm_imatmul(c, a, b) + return c + + def mul_elementwise(a, b): + assert a.shape == b.shape + assert a.domain == b.domain + c = [[aij * bij for aij, bij in zip(ai, bi)] for ai, bi in zip(a, b)] + return DDM(c, a.shape, a.domain) + + def hstack(A, *B): + """Horizontally stacks :py:class:`~.DDM` matrices. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import DDM + + >>> A = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DDM([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + >>> A.hstack(B) + [[1, 2, 5, 6], [3, 4, 7, 8]] + + >>> C = DDM([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + >>> A.hstack(B, C) + [[1, 2, 5, 6, 9, 10], [3, 4, 7, 8, 11, 12]] + """ + Anew = list(A.copy()) + rows, cols = A.shape + domain = A.domain + + for Bk in B: + Bkrows, Bkcols = Bk.shape + assert Bkrows == rows + assert Bk.domain == domain + + cols += Bkcols + + for i, Bki in enumerate(Bk): + Anew[i].extend(Bki) + + return DDM(Anew, (rows, cols), A.domain) + + def vstack(A, *B): + """Vertically stacks :py:class:`~.DDM` matrices. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import DDM + + >>> A = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DDM([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + >>> A.vstack(B) + [[1, 2], [3, 4], [5, 6], [7, 8]] + + >>> C = DDM([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + >>> A.vstack(B, C) + [[1, 2], [3, 4], [5, 6], [7, 8], [9, 10], [11, 12]] + """ + Anew = list(A.copy()) + rows, cols = A.shape + domain = A.domain + + for Bk in B: + Bkrows, Bkcols = Bk.shape + assert Bkcols == cols + assert Bk.domain == domain + + rows += Bkrows + + Anew.extend(Bk.copy()) + + return DDM(Anew, (rows, cols), A.domain) + + def applyfunc(self, func, domain): + elements = [list(map(func, row)) for row in self] + return DDM(elements, self.shape, domain) + + def nnz(a): + """Number of non-zero entries in :py:class:`~.DDM` matrix. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.nnz + """ + return sum(sum(map(bool, row)) for row in a) + + def scc(a): + """Strongly connected components of a square matrix *a*. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import DDM + >>> A = DDM([[ZZ(1), ZZ(0)], [ZZ(0), ZZ(1)]], (2, 2), ZZ) + >>> A.scc() + [[0], [1]] + + See also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.scc + + """ + return a.to_sdm().scc() + + @classmethod + def diag(cls, values, domain): + """Returns a square diagonal matrix with *values* on the diagonal. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import DDM + >>> DDM.diag([ZZ(1), ZZ(2), ZZ(3)], ZZ) + [[1, 0, 0], [0, 2, 0], [0, 0, 3]] + + See also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.diag + """ + return SDM.diag(values, domain).to_ddm() + + def rref(a): + """Reduced-row echelon form of a and list of pivots. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref + Higher level interface to this function. + sympy.polys.matrices.dense.ddm_irref + The underlying algorithm. + """ + b = a.copy() + K = a.domain + partial_pivot = K.is_RealField or K.is_ComplexField + pivots = ddm_irref(b, _partial_pivot=partial_pivot) + return b, pivots + + def rref_den(a): + """Reduced-row echelon form of a with denominator and list of pivots + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref_den + Higher level interface to this function. + sympy.polys.matrices.dense.ddm_irref_den + The underlying algorithm. + """ + b = a.copy() + K = a.domain + denom, pivots = ddm_irref_den(b, K) + return b, denom, pivots + + def nullspace(a): + """Returns a basis for the nullspace of a. + + The domain of the matrix must be a field. + + See Also + ======== + + rref + sympy.polys.matrices.domainmatrix.DomainMatrix.nullspace + """ + rref, pivots = a.rref() + return rref.nullspace_from_rref(pivots) + + def nullspace_from_rref(a, pivots=None): + """Compute the nullspace of a matrix from its rref. + + The domain of the matrix can be any domain. + + Returns a tuple (basis, nonpivots). + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.nullspace + The higher level interface to this function. + """ + m, n = a.shape + K = a.domain + + if pivots is None: + pivots = [] + last_pivot = -1 + for i in range(m): + ai = a[i] + for j in range(last_pivot+1, n): + if ai[j]: + last_pivot = j + pivots.append(j) + break + + if not pivots: + return (a.eye(n, K), list(range(n))) + + # After rref the pivots are all one but after rref_den they may not be. + pivot_val = a[0][pivots[0]] + + basis = [] + nonpivots = [] + for i in range(n): + if i in pivots: + continue + nonpivots.append(i) + vec = [pivot_val if i == j else K.zero for j in range(n)] + for ii, jj in enumerate(pivots): + vec[jj] -= a[ii][i] + basis.append(vec) + + basis_ddm = DDM(basis, (len(basis), n), K) + + return (basis_ddm, nonpivots) + + def particular(a): + return a.to_sdm().particular().to_ddm() + + def det(a): + """Determinant of a""" + m, n = a.shape + if m != n: + raise DMNonSquareMatrixError("Determinant of non-square matrix") + b = a.copy() + K = b.domain + deta = ddm_idet(b, K) + return deta + + def inv(a): + """Inverse of a""" + m, n = a.shape + if m != n: + raise DMNonSquareMatrixError("Determinant of non-square matrix") + ainv = a.copy() + K = a.domain + ddm_iinv(ainv, a, K) + return ainv + + def lu(a): + """L, U decomposition of a""" + m, n = a.shape + K = a.domain + + U = a.copy() + L = a.eye(m, K) + swaps = ddm_ilu_split(L, U, K) + + return L, U, swaps + + def _fflu(self): + """ + Private method for Phase 1 of fraction-free LU decomposition. + Performs row operations and elimination to compute U and permutation indices. + + Returns: + LU : decomposition as a single matrix. + perm (list): Permutation indices for row swaps. + """ + rows, cols = self.shape + K = self.domain + + LU = self.copy() + perm = list(range(rows)) + rank = 0 + + for j in range(min(rows, cols)): + # Skip columns where all entries are zero + if all(LU[i][j] == K.zero for i in range(rows)): + continue + + # Find the first non-zero pivot in the current column + pivot_row = -1 + for i in range(rank, rows): + if LU[i][j] != K.zero: + pivot_row = i + break + + # If no pivot is found, skip column + if pivot_row == -1: + continue + + # Swap rows to bring the pivot to the current rank + if pivot_row != rank: + LU[rank], LU[pivot_row] = LU[pivot_row], LU[rank] + perm[rank], perm[pivot_row] = perm[pivot_row], perm[rank] + + # Found pivot - (Gauss-Bareiss elimination) + pivot = LU[rank][j] + for i in range(rank + 1, rows): + multiplier = LU[i][j] + # Denominator is previous pivot or 1 + denominator = LU[rank - 1][rank - 1] if rank > 0 else K.one + for k in range(j + 1, cols): + LU[i][k] = K.exquo(pivot * LU[i][k] - LU[rank][k] * multiplier, denominator) + # Keep the multiplier for L matrix + LU[i][j] = multiplier + rank += 1 + + return LU, perm + + def fflu(self): + """ + Fraction-free LU decomposition of DDM. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.fflu + The higher-level interface to this function. + """ + rows, cols = self.shape + K = self.domain + + # Phase 1: Perform row operations and get permutation + U, perm = self._fflu() + + # Phase 2: Construct P, L, D matrices + # Create P from permutation + P = self.zeros((rows, rows), K) + for i, pi in enumerate(perm): + P[i][pi] = K.one + + # Create L matrix + L = self.zeros((rows, rows), K) + i = j = 0 + while i < rows and j < cols: + if U[i][j] != K.zero: + # Found non-zero pivot + # Diagonal entry is the pivot + L[i][i] = U[i][j] + for l in range(i + 1, rows): + # Off-diagonal entries are the multipliers + L[l][i] = U[l][j] + # zero out the entries in U + U[l][j] = K.zero + i += 1 + j += 1 + + # Fill remaining diagonal of L with ones + for i in range(i, rows): + L[i][i] = K.one + + # Create D matrix - using FLINT's approach with accumulator + D = self.zeros((rows, rows), K) + if rows >= 1: + D[0][0] = L[0][0] + di = K.one + for i in range(1, rows): + # Accumulate product of pivots + di = L[i - 1][i - 1] * L[i][i] + D[i][i] = di + + return P, L, D, U + + def qr(self): + """ + QR decomposition for DDM. + + Returns: + - Q: Orthogonal matrix as a DDM. + - R: Upper triangular matrix as a DDM. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.qr + The higher-level interface to this function. + """ + rows, cols = self.shape + K = self.domain + Q = self.copy() + R = self.zeros((min(rows, cols), cols), K) + + # Check that the domain is a field + if not K.is_Field: + raise DMDomainError("QR decomposition requires a field (e.g. QQ).") + + dot_cols = lambda i, j: K.sum(Q[k][i] * Q[k][j] for k in range(rows)) + + for j in range(cols): + for i in range(min(j, rows)): + dot_ii = dot_cols(i, i) + if dot_ii != K.zero: + R[i][j] = dot_cols(i, j) / dot_ii + for k in range(rows): + Q[k][j] -= R[i][j] * Q[k][i] + + if j < rows: + dot_jj = dot_cols(j, j) + if dot_jj != K.zero: + R[j][j] = K.one + + Q = Q.extract(range(rows), range(min(rows, cols))) + + return Q, R + + def lu_solve(a, b): + """x where a*x = b""" + m, n = a.shape + m2, o = b.shape + a._check(a, 'lu_solve', b, m, m2) + if not a.domain.is_Field: + raise DMDomainError("lu_solve requires a field") + + L, U, swaps = a.lu() + x = a.zeros((n, o), a.domain) + ddm_ilu_solve(x, L, U, swaps, b) + return x + + def charpoly(a): + """Coefficients of characteristic polynomial of a""" + K = a.domain + m, n = a.shape + if m != n: + raise DMNonSquareMatrixError("Charpoly of non-square matrix") + vec = ddm_berk(a, K) + coeffs = [vec[i][0] for i in range(n+1)] + return coeffs + + def is_zero_matrix(self): + """ + Says whether this matrix has all zero entries. + """ + zero = self.domain.zero + return all(Mij == zero for Mij in self.flatiter()) + + def is_upper(self): + """ + Says whether this matrix is upper-triangular. True can be returned + even if the matrix is not square. + """ + zero = self.domain.zero + return all(Mij == zero for i, Mi in enumerate(self) for Mij in Mi[:i]) + + def is_lower(self): + """ + Says whether this matrix is lower-triangular. True can be returned + even if the matrix is not square. + """ + zero = self.domain.zero + return all(Mij == zero for i, Mi in enumerate(self) for Mij in Mi[i+1:]) + + def is_diagonal(self): + """ + Says whether this matrix is diagonal. True can be returned even if + the matrix is not square. + """ + return self.is_upper() and self.is_lower() + + def diagonal(self): + """ + Returns a list of the elements from the diagonal of the matrix. + """ + m, n = self.shape + return [self[i][i] for i in range(min(m, n))] + + def lll(A, delta=QQ(3, 4)): + return ddm_lll(A, delta=delta) + + def lll_transform(A, delta=QQ(3, 4)): + return ddm_lll_transform(A, delta=delta) + + +from .sdm import SDM +from .dfm import DFM diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dense.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dense.py new file mode 100644 index 0000000000000000000000000000000000000000..47ab2d6897c6d9f3781af23ccb68f96f15c7e859 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dense.py @@ -0,0 +1,824 @@ +""" + +Module for the ddm_* routines for operating on a matrix in list of lists +matrix representation. + +These routines are used internally by the DDM class which also provides a +friendlier interface for them. The idea here is to implement core matrix +routines in a way that can be applied to any simple list representation +without the need to use any particular matrix class. For example we can +compute the RREF of a matrix like: + + >>> from sympy.polys.matrices.dense import ddm_irref + >>> M = [[1, 2, 3], [4, 5, 6]] + >>> pivots = ddm_irref(M) + >>> M + [[1.0, 0.0, -1.0], [0, 1.0, 2.0]] + +These are lower-level routines that work mostly in place.The routines at this +level should not need to know what the domain of the elements is but should +ideally document what operations they will use and what functions they need to +be provided with. + +The next-level up is the DDM class which uses these routines but wraps them up +with an interface that handles copying etc and keeps track of the Domain of +the elements of the matrix: + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.matrices.ddm import DDM + >>> M = DDM([[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]], (2, 3), QQ) + >>> M + [[1, 2, 3], [4, 5, 6]] + >>> Mrref, pivots = M.rref() + >>> Mrref + [[1, 0, -1], [0, 1, 2]] + +""" +from __future__ import annotations +from operator import mul +from .exceptions import ( + DMShapeError, + DMDomainError, + DMNonInvertibleMatrixError, + DMNonSquareMatrixError, +) +from typing import Sequence, TypeVar +from sympy.polys.matrices._typing import RingElement + + +#: Type variable for the elements of the matrix +T = TypeVar('T') + +#: Type variable for the elements of the matrix that are in a ring +R = TypeVar('R', bound=RingElement) + + +def ddm_transpose(matrix: Sequence[Sequence[T]]) -> list[list[T]]: + """matrix transpose""" + return list(map(list, zip(*matrix))) + + +def ddm_iadd(a: list[list[R]], b: Sequence[Sequence[R]]) -> None: + """a += b""" + for ai, bi in zip(a, b): + for j, bij in enumerate(bi): + ai[j] += bij + + +def ddm_isub(a: list[list[R]], b: Sequence[Sequence[R]]) -> None: + """a -= b""" + for ai, bi in zip(a, b): + for j, bij in enumerate(bi): + ai[j] -= bij + + +def ddm_ineg(a: list[list[R]]) -> None: + """a <-- -a""" + for ai in a: + for j, aij in enumerate(ai): + ai[j] = -aij + + +def ddm_imul(a: list[list[R]], b: R) -> None: + """a <-- a*b""" + for ai in a: + for j, aij in enumerate(ai): + ai[j] = aij * b + + +def ddm_irmul(a: list[list[R]], b: R) -> None: + """a <-- b*a""" + for ai in a: + for j, aij in enumerate(ai): + ai[j] = b * aij + + +def ddm_imatmul( + a: list[list[R]], b: Sequence[Sequence[R]], c: Sequence[Sequence[R]] +) -> None: + """a += b @ c""" + cT = list(zip(*c)) + + for bi, ai in zip(b, a): + for j, cTj in enumerate(cT): + ai[j] = sum(map(mul, bi, cTj), ai[j]) + + +def ddm_irref(a, _partial_pivot=False): + """In-place reduced row echelon form of a matrix. + + Compute the reduced row echelon form of $a$. Modifies $a$ in place and + returns a list of the pivot columns. + + Uses naive Gauss-Jordan elimination in the ground domain which must be a + field. + + This routine is only really suitable for use with simple field domains like + :ref:`GF(p)`, :ref:`QQ` and :ref:`QQ(a)` although even for :ref:`QQ` with + larger matrices it is possibly more efficient to use fraction free + approaches. + + This method is not suitable for use with rational function fields + (:ref:`K(x)`) because the elements will blowup leading to costly gcd + operations. In this case clearing denominators and using fraction free + approaches is likely to be more efficient. + + For inexact numeric domains like :ref:`RR` and :ref:`CC` pass + ``_partial_pivot=True`` to use partial pivoting to control rounding errors. + + Examples + ======== + + >>> from sympy.polys.matrices.dense import ddm_irref + >>> from sympy import QQ + >>> M = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]] + >>> pivots = ddm_irref(M) + >>> M + [[1, 0, -1], [0, 1, 2]] + >>> pivots + [0, 1] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref + Higher level interface to this routine. + ddm_irref_den + The fraction free version of this routine. + sdm_irref + A sparse version of this routine. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Row_echelon_form#Reduced_row_echelon_form + """ + # We compute aij**-1 below and then use multiplication instead of division + # in the innermost loop. The domain here is a field so either operation is + # defined. There are significant performance differences for some domains + # though. In the case of e.g. QQ or QQ(x) inversion is free but + # multiplication and division have the same cost so it makes no difference. + # In cases like GF(p), QQ, RR or CC though multiplication is + # faster than division so reusing a precomputed inverse for many + # multiplications can be a lot faster. The biggest win is QQ when + # deg(minpoly(a)) is large. + # + # With domains like QQ(x) this can perform badly for other reasons. + # Typically the initial matrix has simple denominators and the + # fraction-free approach with exquo (ddm_irref_den) will preserve that + # property throughout. The method here causes denominator blowup leading to + # expensive gcd reductions in the intermediate expressions. With many + # generators like QQ(x,y,z,...) this is extremely bad. + # + # TODO: Use a nontrivial pivoting strategy to control intermediate + # expression growth. Rearranging rows and/or columns could defer the most + # complicated elements until the end. If the first pivot is a + # complicated/large element then the first round of reduction will + # immediately introduce expression blowup across the whole matrix. + + # a is (m x n) + m = len(a) + if not m: + return [] + n = len(a[0]) + + i = 0 + pivots = [] + + for j in range(n): + # Proper pivoting should be used for all domains for performance + # reasons but it is only strictly needed for RR and CC (and possibly + # other domains like RR(x)). This path is used by DDM.rref() if the + # domain is RR or CC. It uses partial (row) pivoting based on the + # absolute value of the pivot candidates. + if _partial_pivot: + ip = max(range(i, m), key=lambda ip: abs(a[ip][j])) + a[i], a[ip] = a[ip], a[i] + + # pivot + aij = a[i][j] + + # zero-pivot + if not aij: + for ip in range(i+1, m): + aij = a[ip][j] + # row-swap + if aij: + a[i], a[ip] = a[ip], a[i] + break + else: + # next column + continue + + # normalise row + ai = a[i] + aijinv = aij**-1 + for l in range(j, n): + ai[l] *= aijinv # ai[j] = one + + # eliminate above and below to the right + for k, ak in enumerate(a): + if k == i or not ak[j]: + continue + akj = ak[j] + ak[j] -= akj # ak[j] = zero + for l in range(j+1, n): + ak[l] -= akj * ai[l] + + # next row + pivots.append(j) + i += 1 + + # no more rows? + if i >= m: + break + + return pivots + + +def ddm_irref_den(a, K): + """a <-- rref(a); return (den, pivots) + + Compute the fraction-free reduced row echelon form (RREF) of $a$. Modifies + $a$ in place and returns a tuple containing the denominator of the RREF and + a list of the pivot columns. + + Explanation + =========== + + The algorithm used is the fraction-free version of Gauss-Jordan elimination + described as FFGJ in [1]_. Here it is modified to handle zero or missing + pivots and to avoid redundant arithmetic. + + The domain $K$ must support exact division (``K.exquo``) but does not need + to be a field. This method is suitable for most exact rings and fields like + :ref:`ZZ`, :ref:`QQ` and :ref:`QQ(a)`. In the case of :ref:`QQ` or + :ref:`K(x)` it might be more efficient to clear denominators and use + :ref:`ZZ` or :ref:`K[x]` instead. + + For inexact domains like :ref:`RR` and :ref:`CC` use ``ddm_irref`` instead. + + Examples + ======== + + >>> from sympy.polys.matrices.dense import ddm_irref_den + >>> from sympy import ZZ, Matrix + >>> M = [[ZZ(1), ZZ(2), ZZ(3)], [ZZ(4), ZZ(5), ZZ(6)]] + >>> den, pivots = ddm_irref_den(M, ZZ) + >>> M + [[-3, 0, 3], [0, -3, -6]] + >>> den + -3 + >>> pivots + [0, 1] + >>> Matrix(M).rref()[0] + Matrix([ + [1, 0, -1], + [0, 1, 2]]) + + See Also + ======== + + ddm_irref + A version of this routine that uses field division. + sdm_irref + A sparse version of :func:`ddm_irref`. + sdm_rref_den + A sparse version of :func:`ddm_irref_den`. + sympy.polys.matrices.domainmatrix.DomainMatrix.rref_den + Higher level interface. + + References + ========== + + .. [1] Fraction-free algorithms for linear and polynomial equations. + George C. Nakos , Peter R. Turner , Robert M. Williams. + https://dl.acm.org/doi/10.1145/271130.271133 + """ + # + # A simpler presentation of this algorithm is given in [1]: + # + # Given an n x n matrix A and n x 1 matrix b: + # + # for i in range(n): + # if i != 0: + # d = a[i-1][i-1] + # for j in range(n): + # if j == i: + # continue + # b[j] = a[i][i]*b[j] - a[j][i]*b[i] + # for k in range(n): + # a[j][k] = a[i][i]*a[j][k] - a[j][i]*a[i][k] + # if i != 0: + # a[j][k] /= d + # + # Our version here is a bit more complicated because: + # + # 1. We use row-swaps to avoid zero pivots. + # 2. We allow for some columns to be missing pivots. + # 3. We avoid a lot of redundant arithmetic. + # + # TODO: Use a non-trivial pivoting strategy. Even just row swapping makes a + # big difference to performance if e.g. the upper-left entry of the matrix + # is a huge polynomial. + + # a is (m x n) + m = len(a) + if not m: + return K.one, [] + n = len(a[0]) + + d = None + pivots = [] + no_pivots = [] + + # i, j will be the row and column indices of the current pivot + i = 0 + for j in range(n): + # next pivot? + aij = a[i][j] + + # swap rows if zero + if not aij: + for ip in range(i+1, m): + aij = a[ip][j] + # row-swap + if aij: + a[i], a[ip] = a[ip], a[i] + break + else: + # go to next column + no_pivots.append(j) + continue + + # Now aij is the pivot and i,j are the row and column. We need to clear + # the column above and below but we also need to keep track of the + # denominator of the RREF which means also multiplying everything above + # and to the left by the current pivot aij and dividing by d (which we + # multiplied everything by in the previous iteration so this is an + # exact division). + # + # First handle the upper left corner which is usually already diagonal + # with all diagonal entries equal to the current denominator but there + # can be other non-zero entries in any column that has no pivot. + + # Update previous pivots in the matrix + if pivots: + pivot_val = aij * a[0][pivots[0]] + # Divide out the common factor + if d is not None: + pivot_val = K.exquo(pivot_val, d) + + # Could defer this until the end but it is pretty cheap and + # helps when debugging. + for ip, jp in enumerate(pivots): + a[ip][jp] = pivot_val + + # Update columns without pivots + for jnp in no_pivots: + for ip in range(i): + aijp = a[ip][jnp] + if aijp: + aijp *= aij + if d is not None: + aijp = K.exquo(aijp, d) + a[ip][jnp] = aijp + + # Eliminate above, below and to the right as in ordinary division free + # Gauss-Jordan elmination except also dividing out d from every entry. + + for jp, aj in enumerate(a): + + # Skip the current row + if jp == i: + continue + + # Eliminate to the right in all rows + for kp in range(j+1, n): + ajk = aij * aj[kp] - aj[j] * a[i][kp] + if d is not None: + ajk = K.exquo(ajk, d) + aj[kp] = ajk + + # Set to zero above and below the pivot + aj[j] = K.zero + + # next row + pivots.append(j) + i += 1 + + # no more rows left? + if i >= m: + break + + if not K.is_one(aij): + d = aij + else: + d = None + + if not pivots: + denom = K.one + else: + denom = a[0][pivots[0]] + + return denom, pivots + + +def ddm_idet(a, K): + """a <-- echelon(a); return det + + Explanation + =========== + + Compute the determinant of $a$ using the Bareiss fraction-free algorithm. + The matrix $a$ is modified in place. Its diagonal elements are the + determinants of the leading principal minors. The determinant of $a$ is + returned. + + The domain $K$ must support exact division (``K.exquo``). This method is + suitable for most exact rings and fields like :ref:`ZZ`, :ref:`QQ` and + :ref:`QQ(a)` but not for inexact domains like :ref:`RR` and :ref:`CC`. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.ddm import ddm_idet + >>> a = [[ZZ(1), ZZ(2), ZZ(3)], [ZZ(4), ZZ(5), ZZ(6)], [ZZ(7), ZZ(8), ZZ(9)]] + >>> a + [[1, 2, 3], [4, 5, 6], [7, 8, 9]] + >>> ddm_idet(a, ZZ) + 0 + >>> a + [[1, 2, 3], [4, -3, -6], [7, -6, 0]] + >>> [a[i][i] for i in range(len(a))] + [1, -3, 0] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.det + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Bareiss_algorithm + .. [2] https://www.math.usm.edu/perry/Research/Thesis_DRL.pdf + """ + # Bareiss algorithm + # https://www.math.usm.edu/perry/Research/Thesis_DRL.pdf + + # a is (m x n) + m = len(a) + if not m: + return K.one + n = len(a[0]) + + exquo = K.exquo + # uf keeps track of the sign change from row swaps + uf = K.one + + for k in range(n-1): + if not a[k][k]: + for i in range(k+1, n): + if a[i][k]: + a[k], a[i] = a[i], a[k] + uf = -uf + break + else: + return K.zero + + akkm1 = a[k-1][k-1] if k else K.one + + for i in range(k+1, n): + for j in range(k+1, n): + a[i][j] = exquo(a[i][j]*a[k][k] - a[i][k]*a[k][j], akkm1) + + return uf * a[-1][-1] + + +def ddm_iinv(ainv, a, K): + """ainv <-- inv(a) + + Compute the inverse of a matrix $a$ over a field $K$ using Gauss-Jordan + elimination. The result is stored in $ainv$. + + Uses division in the ground domain which should be an exact field. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import ddm_iinv, ddm_imatmul + >>> from sympy import QQ + >>> a = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + >>> ainv = [[None, None], [None, None]] + >>> ddm_iinv(ainv, a, QQ) + >>> ainv + [[-2, 1], [3/2, -1/2]] + >>> result = [[QQ(0), QQ(0)], [QQ(0), QQ(0)]] + >>> ddm_imatmul(result, a, ainv) + >>> result + [[1, 0], [0, 1]] + + See Also + ======== + + ddm_irref: the underlying routine. + """ + if not K.is_Field: + raise DMDomainError('Not a field') + + # a is (m x n) + m = len(a) + if not m: + return + n = len(a[0]) + if m != n: + raise DMNonSquareMatrixError + + eye = [[K.one if i==j else K.zero for j in range(n)] for i in range(n)] + Aaug = [row + eyerow for row, eyerow in zip(a, eye)] + pivots = ddm_irref(Aaug) + if pivots != list(range(n)): + raise DMNonInvertibleMatrixError('Matrix det == 0; not invertible.') + ainv[:] = [row[n:] for row in Aaug] + + +def ddm_ilu_split(L, U, K): + """L, U <-- LU(U) + + Compute the LU decomposition of a matrix $L$ in place and store the lower + and upper triangular matrices in $L$ and $U$, respectively. Returns a list + of row swaps that were performed. + + Uses division in the ground domain which should be an exact field. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import ddm_ilu_split + >>> from sympy import QQ + >>> L = [[QQ(0), QQ(0)], [QQ(0), QQ(0)]] + >>> U = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + >>> swaps = ddm_ilu_split(L, U, QQ) + >>> swaps + [] + >>> L + [[0, 0], [3, 0]] + >>> U + [[1, 2], [0, -2]] + + See Also + ======== + + ddm_ilu + ddm_ilu_solve + """ + m = len(U) + if not m: + return [] + n = len(U[0]) + + swaps = ddm_ilu(U) + + zeros = [K.zero] * min(m, n) + for i in range(1, m): + j = min(i, n) + L[i][:j] = U[i][:j] + U[i][:j] = zeros[:j] + + return swaps + + +def ddm_ilu(a): + """a <-- LU(a) + + Computes the LU decomposition of a matrix in place. Returns a list of + row swaps that were performed. + + Uses division in the ground domain which should be an exact field. + + This is only suitable for domains like :ref:`GF(p)`, :ref:`QQ`, :ref:`QQ_I` + and :ref:`QQ(a)`. With a rational function field like :ref:`K(x)` it is + better to clear denominators and use division-free algorithms. Pivoting is + used to avoid exact zeros but not for floating point accuracy so :ref:`RR` + and :ref:`CC` are not suitable (use :func:`ddm_irref` instead). + + Examples + ======== + + >>> from sympy.polys.matrices.dense import ddm_ilu + >>> from sympy import QQ + >>> a = [[QQ(1, 2), QQ(1, 3)], [QQ(1, 4), QQ(1, 5)]] + >>> swaps = ddm_ilu(a) + >>> swaps + [] + >>> a + [[1/2, 1/3], [1/2, 1/30]] + + The same example using ``Matrix``: + + >>> from sympy import Matrix, S + >>> M = Matrix([[S(1)/2, S(1)/3], [S(1)/4, S(1)/5]]) + >>> L, U, swaps = M.LUdecomposition() + >>> L + Matrix([ + [ 1, 0], + [1/2, 1]]) + >>> U + Matrix([ + [1/2, 1/3], + [ 0, 1/30]]) + >>> swaps + [] + + See Also + ======== + + ddm_irref + ddm_ilu_solve + sympy.matrices.matrixbase.MatrixBase.LUdecomposition + """ + m = len(a) + if not m: + return [] + n = len(a[0]) + + swaps = [] + + for i in range(min(m, n)): + if not a[i][i]: + for ip in range(i+1, m): + if a[ip][i]: + swaps.append((i, ip)) + a[i], a[ip] = a[ip], a[i] + break + else: + # M = Matrix([[1, 0, 0, 0], [0, 0, 0, 0], [0, 0, 1, 1], [0, 0, 1, 2]]) + continue + for j in range(i+1, m): + l_ji = a[j][i] / a[i][i] + a[j][i] = l_ji + for k in range(i+1, n): + a[j][k] -= l_ji * a[i][k] + + return swaps + + +def ddm_ilu_solve(x, L, U, swaps, b): + """x <-- solve(L*U*x = swaps(b)) + + Solve a linear system, $A*x = b$, given an LU factorization of $A$. + + Uses division in the ground domain which must be a field. + + Modifies $x$ in place. + + Examples + ======== + + Compute the LU decomposition of $A$ (in place): + + >>> from sympy import QQ + >>> from sympy.polys.matrices.dense import ddm_ilu, ddm_ilu_solve + >>> A = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + >>> swaps = ddm_ilu(A) + >>> A + [[1, 2], [3, -2]] + >>> L = U = A + + Solve the linear system: + + >>> b = [[QQ(5)], [QQ(6)]] + >>> x = [[None], [None]] + >>> ddm_ilu_solve(x, L, U, swaps, b) + >>> x + [[-4], [9/2]] + + See Also + ======== + + ddm_ilu + Compute the LU decomposition of a matrix in place. + ddm_ilu_split + Compute the LU decomposition of a matrix and separate $L$ and $U$. + sympy.polys.matrices.domainmatrix.DomainMatrix.lu_solve + Higher level interface to this function. + """ + m = len(U) + if not m: + return + n = len(U[0]) + + m2 = len(b) + if not m2: + raise DMShapeError("Shape mismtch") + o = len(b[0]) + + if m != m2: + raise DMShapeError("Shape mismtch") + if m < n: + raise NotImplementedError("Underdetermined") + + if swaps: + b = [row[:] for row in b] + for i1, i2 in swaps: + b[i1], b[i2] = b[i2], b[i1] + + # solve Ly = b + y = [[None] * o for _ in range(m)] + for k in range(o): + for i in range(m): + rhs = b[i][k] + for j in range(i): + rhs -= L[i][j] * y[j][k] + y[i][k] = rhs + + if m > n: + for i in range(n, m): + for j in range(o): + if y[i][j]: + raise DMNonInvertibleMatrixError + + # Solve Ux = y + for k in range(o): + for i in reversed(range(n)): + if not U[i][i]: + raise DMNonInvertibleMatrixError + rhs = y[i][k] + for j in range(i+1, n): + rhs -= U[i][j] * x[j][k] + x[i][k] = rhs / U[i][i] + + +def ddm_berk(M, K): + """ + Berkowitz algorithm for computing the characteristic polynomial. + + Explanation + =========== + + The Berkowitz algorithm is a division-free algorithm for computing the + characteristic polynomial of a matrix over any commutative ring using only + arithmetic in the coefficient ring. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.polys.matrices.dense import ddm_berk + >>> from sympy.polys.domains import ZZ + >>> M = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + >>> ddm_berk(M, ZZ) + [[1], [-5], [-2]] + >>> Matrix(M).charpoly() + PurePoly(lambda**2 - 5*lambda - 2, lambda, domain='ZZ') + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.charpoly + The high-level interface to this function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Samuelson%E2%80%93Berkowitz_algorithm + """ + m = len(M) + if not m: + return [[K.one]] + n = len(M[0]) + + if m != n: + raise DMShapeError("Not square") + + if n == 1: + return [[K.one], [-M[0][0]]] + + a = M[0][0] + R = [M[0][1:]] + C = [[row[0]] for row in M[1:]] + A = [row[1:] for row in M[1:]] + + q = ddm_berk(A, K) + + T = [[K.zero] * n for _ in range(n+1)] + for i in range(n): + T[i][i] = K.one + T[i+1][i] = -a + for i in range(2, n+1): + if i == 2: + AnC = C + else: + C = AnC + AnC = [[K.zero] for row in C] + ddm_imatmul(AnC, A, C) + RAnC = [[K.zero]] + ddm_imatmul(RAnC, R, AnC) + for j in range(0, n+1-i): + T[i+j][j] = -RAnC[0][0] + + qout = [[K.zero] for _ in range(n+1)] + ddm_imatmul(qout, T, q) + return qout diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dfm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dfm.py new file mode 100644 index 0000000000000000000000000000000000000000..22938b7004654121f74b020bd6649bee84909e1e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/dfm.py @@ -0,0 +1,35 @@ +""" +sympy.polys.matrices.dfm + +Provides the :class:`DFM` class if ``GROUND_TYPES=flint'``. Otherwise, ``DFM`` +is a placeholder class that raises NotImplementedError when instantiated. +""" + +from sympy.external.gmpy import GROUND_TYPES + +if GROUND_TYPES == "flint": # pragma: no cover + # When python-flint is installed we will try to use it for dense matrices + # if the domain is supported by python-flint. + from ._dfm import DFM + +else: # pragma: no cover + # Other code should be able to import this and it should just present as a + # version of DFM that does not support any domains. + class DFM_dummy: + """ + Placeholder class for DFM when python-flint is not installed. + """ + def __init__(*args, **kwargs): + raise NotImplementedError("DFM requires GROUND_TYPES=flint.") + + @classmethod + def _supports_domain(cls, domain): + return False + + @classmethod + def _get_flint_func(cls, domain): + raise NotImplementedError("DFM requires GROUND_TYPES=flint.") + + # mypy really struggles with this kind of conditional type assignment. + # Maybe there is a better way to annotate this rather than type: ignore. + DFM = DFM_dummy # type: ignore diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainmatrix.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..627835eca93b5e70f9aa121f097c9828a709ca78 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainmatrix.py @@ -0,0 +1,3983 @@ +""" + +Module for the DomainMatrix class. + +A DomainMatrix represents a matrix with elements that are in a particular +Domain. Each DomainMatrix internally wraps a DDM which is used for the +lower-level operations. The idea is that the DomainMatrix class provides the +convenience routines for converting between Expr and the poly domains as well +as unifying matrices with different domains. + +""" +from __future__ import annotations +from collections import Counter +from functools import reduce + +from sympy.external.gmpy import GROUND_TYPES +from sympy.utilities.decorator import doctest_depends_on + +from sympy.core.sympify import _sympify + +from ..domains import Domain + +from ..constructor import construct_domain + +from .exceptions import ( + DMFormatError, + DMBadInputError, + DMShapeError, + DMDomainError, + DMNotAField, + DMNonSquareMatrixError, + DMNonInvertibleMatrixError +) + +from .domainscalar import DomainScalar + +from sympy.polys.domains import ZZ, EXRAW, QQ + +from sympy.polys.densearith import dup_mul +from sympy.polys.densebasic import dup_convert +from sympy.polys.densetools import ( + dup_mul_ground, + dup_quo_ground, + dup_content, + dup_clear_denoms, + dup_primitive, + dup_transform, +) +from sympy.polys.factortools import dup_factor_list +from sympy.polys.polyutils import _sort_factors + +from .ddm import DDM + +from .sdm import SDM + +from .dfm import DFM + +from .rref import _dm_rref, _dm_rref_den + + +if GROUND_TYPES != 'flint': + __doctest_skip__ = ['DomainMatrix.to_dfm', 'DomainMatrix.to_dfm_or_ddm'] +else: + __doctest_skip__ = ['DomainMatrix.from_list'] + + +def DM(rows, domain): + """Convenient alias for DomainMatrix.from_list + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> DM([[1, 2], [3, 4]], ZZ) + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + + See Also + ======== + + DomainMatrix.from_list + """ + return DomainMatrix.from_list(rows, domain) + + +class DomainMatrix: + r""" + Associate Matrix with :py:class:`~.Domain` + + Explanation + =========== + + DomainMatrix uses :py:class:`~.Domain` for its internal representation + which makes it faster than the SymPy Matrix class (currently) for many + common operations, but this advantage makes it not entirely compatible + with Matrix. DomainMatrix are analogous to numpy arrays with "dtype". + In the DomainMatrix, each element has a domain such as :ref:`ZZ` + or :ref:`QQ(a)`. + + + Examples + ======== + + Creating a DomainMatrix from the existing Matrix class: + + >>> from sympy import Matrix + >>> from sympy.polys.matrices import DomainMatrix + >>> Matrix1 = Matrix([ + ... [1, 2], + ... [3, 4]]) + >>> A = DomainMatrix.from_Matrix(Matrix1) + >>> A + DomainMatrix({0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}}, (2, 2), ZZ) + + Directly forming a DomainMatrix: + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> A + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + + See Also + ======== + + DDM + SDM + Domain + Poly + + """ + rep: SDM | DDM | DFM + shape: tuple[int, int] + domain: Domain + + def __new__(cls, rows, shape, domain, *, fmt=None): + """ + Creates a :py:class:`~.DomainMatrix`. + + Parameters + ========== + + rows : Represents elements of DomainMatrix as list of lists + shape : Represents dimension of DomainMatrix + domain : Represents :py:class:`~.Domain` of DomainMatrix + + Raises + ====== + + TypeError + If any of rows, shape and domain are not provided + + """ + if isinstance(rows, (DDM, SDM, DFM)): + raise TypeError("Use from_rep to initialise from SDM/DDM") + elif isinstance(rows, list): + rep = DDM(rows, shape, domain) + elif isinstance(rows, dict): + rep = SDM(rows, shape, domain) + else: + msg = "Input should be list-of-lists or dict-of-dicts" + raise TypeError(msg) + + if fmt is not None: + if fmt == 'sparse': + rep = rep.to_sdm() + elif fmt == 'dense': + rep = rep.to_ddm() + else: + raise ValueError("fmt should be 'sparse' or 'dense'") + + # Use python-flint for dense matrices if possible + if rep.fmt == 'dense' and DFM._supports_domain(domain): + rep = rep.to_dfm() + + return cls.from_rep(rep) + + def __reduce__(self): + rep = self.rep + if rep.fmt == 'dense': + arg = self.to_list() + elif rep.fmt == 'sparse': + arg = dict(rep) + else: + raise RuntimeError # pragma: no cover + args = (arg, rep.shape, rep.domain) + return (self.__class__, args) + + def __getitem__(self, key): + i, j = key + m, n = self.shape + if not (isinstance(i, slice) or isinstance(j, slice)): + return DomainScalar(self.rep.getitem(i, j), self.domain) + + if not isinstance(i, slice): + if not -m <= i < m: + raise IndexError("Row index out of range") + i = i % m + i = slice(i, i+1) + if not isinstance(j, slice): + if not -n <= j < n: + raise IndexError("Column index out of range") + j = j % n + j = slice(j, j+1) + + return self.from_rep(self.rep.extract_slice(i, j)) + + def getitem_sympy(self, i, j): + return self.domain.to_sympy(self.rep.getitem(i, j)) + + def extract(self, rowslist, colslist): + return self.from_rep(self.rep.extract(rowslist, colslist)) + + def __setitem__(self, key, value): + i, j = key + if not self.domain.of_type(value): + raise TypeError + if isinstance(i, int) and isinstance(j, int): + self.rep.setitem(i, j, value) + else: + raise NotImplementedError + + @classmethod + def from_rep(cls, rep): + """Create a new DomainMatrix efficiently from DDM/SDM. + + Examples + ======== + + Create a :py:class:`~.DomainMatrix` with an dense internal + representation as :py:class:`~.DDM`: + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.matrices.ddm import DDM + >>> drep = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> dM = DomainMatrix.from_rep(drep) + >>> dM + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + + Create a :py:class:`~.DomainMatrix` with a sparse internal + representation as :py:class:`~.SDM`: + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import ZZ + >>> drep = SDM({0:{1:ZZ(1)},1:{0:ZZ(2)}}, (2, 2), ZZ) + >>> dM = DomainMatrix.from_rep(drep) + >>> dM + DomainMatrix({0: {1: 1}, 1: {0: 2}}, (2, 2), ZZ) + + Parameters + ========== + + rep: SDM or DDM + The internal sparse or dense representation of the matrix. + + Returns + ======= + + DomainMatrix + A :py:class:`~.DomainMatrix` wrapping *rep*. + + Notes + ===== + + This takes ownership of rep as its internal representation. If rep is + being mutated elsewhere then a copy should be provided to + ``from_rep``. Only minimal verification or checking is done on *rep* + as this is supposed to be an efficient internal routine. + + """ + if not (isinstance(rep, (DDM, SDM)) or (DFM is not None and isinstance(rep, DFM))): + raise TypeError("rep should be of type DDM or SDM") + self = super().__new__(cls) + self.rep = rep + self.shape = rep.shape + self.domain = rep.domain + return self + + @classmethod + @doctest_depends_on(ground_types=['python', 'gmpy']) + def from_list(cls, rows, domain): + r""" + Convert a list of lists into a DomainMatrix + + Parameters + ========== + + rows: list of lists + Each element of the inner lists should be either the single arg, + or tuple of args, that would be passed to the domain constructor + in order to form an element of the domain. See examples. + + Returns + ======= + + DomainMatrix containing elements defined in rows + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import FF, QQ, ZZ + >>> A = DomainMatrix.from_list([[1, 0, 1], [0, 0, 1]], ZZ) + >>> A + DomainMatrix([[1, 0, 1], [0, 0, 1]], (2, 3), ZZ) + >>> B = DomainMatrix.from_list([[1, 0, 1], [0, 0, 1]], FF(7)) + >>> B + DomainMatrix([[1 mod 7, 0 mod 7, 1 mod 7], [0 mod 7, 0 mod 7, 1 mod 7]], (2, 3), GF(7)) + >>> C = DomainMatrix.from_list([[(1, 2), (3, 1)], [(1, 4), (5, 1)]], QQ) + >>> C + DomainMatrix([[1/2, 3], [1/4, 5]], (2, 2), QQ) + + See Also + ======== + + from_list_sympy + + """ + nrows = len(rows) + ncols = 0 if not nrows else len(rows[0]) + conv = lambda e: domain(*e) if isinstance(e, tuple) else domain(e) + domain_rows = [[conv(e) for e in row] for row in rows] + return DomainMatrix(domain_rows, (nrows, ncols), domain) + + @classmethod + def from_list_sympy(cls, nrows, ncols, rows, **kwargs): + r""" + Convert a list of lists of Expr into a DomainMatrix using construct_domain + + Parameters + ========== + + nrows: number of rows + ncols: number of columns + rows: list of lists + + Returns + ======= + + DomainMatrix containing elements of rows + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.abc import x, y, z + >>> A = DomainMatrix.from_list_sympy(1, 3, [[x, y, z]]) + >>> A + DomainMatrix([[x, y, z]], (1, 3), ZZ[x,y,z]) + + See Also + ======== + + sympy.polys.constructor.construct_domain, from_dict_sympy + + """ + assert len(rows) == nrows + assert all(len(row) == ncols for row in rows) + + items_sympy = [_sympify(item) for row in rows for item in row] + + domain, items_domain = cls.get_domain(items_sympy, **kwargs) + + domain_rows = [[items_domain[ncols*r + c] for c in range(ncols)] for r in range(nrows)] + + return DomainMatrix(domain_rows, (nrows, ncols), domain) + + @classmethod + def from_dict_sympy(cls, nrows, ncols, elemsdict, **kwargs): + """ + + Parameters + ========== + + nrows: number of rows + ncols: number of cols + elemsdict: dict of dicts containing non-zero elements of the DomainMatrix + + Returns + ======= + + DomainMatrix containing elements of elemsdict + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.abc import x,y,z + >>> elemsdict = {0: {0:x}, 1:{1: y}, 2: {2: z}} + >>> A = DomainMatrix.from_dict_sympy(3, 3, elemsdict) + >>> A + DomainMatrix({0: {0: x}, 1: {1: y}, 2: {2: z}}, (3, 3), ZZ[x,y,z]) + + See Also + ======== + + from_list_sympy + + """ + if not all(0 <= r < nrows for r in elemsdict): + raise DMBadInputError("Row out of range") + if not all(0 <= c < ncols for row in elemsdict.values() for c in row): + raise DMBadInputError("Column out of range") + + items_sympy = [_sympify(item) for row in elemsdict.values() for item in row.values()] + domain, items_domain = cls.get_domain(items_sympy, **kwargs) + + idx = 0 + items_dict = {} + for i, row in elemsdict.items(): + items_dict[i] = {} + for j in row: + items_dict[i][j] = items_domain[idx] + idx += 1 + + return DomainMatrix(items_dict, (nrows, ncols), domain) + + @classmethod + def from_Matrix(cls, M, fmt='sparse',**kwargs): + r""" + Convert Matrix to DomainMatrix + + Parameters + ========== + + M: Matrix + + Returns + ======= + + Returns DomainMatrix with identical elements as M + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.polys.matrices import DomainMatrix + >>> M = Matrix([ + ... [1.0, 3.4], + ... [2.4, 1]]) + >>> A = DomainMatrix.from_Matrix(M) + >>> A + DomainMatrix({0: {0: 1.0, 1: 3.4}, 1: {0: 2.4, 1: 1.0}}, (2, 2), RR) + + We can keep internal representation as ddm using fmt='dense' + >>> from sympy import Matrix, QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix.from_Matrix(Matrix([[QQ(1, 2), QQ(3, 4)], [QQ(0, 1), QQ(0, 1)]]), fmt='dense') + >>> A.rep + [[1/2, 3/4], [0, 0]] + + See Also + ======== + + Matrix + + """ + if fmt == 'dense': + return cls.from_list_sympy(*M.shape, M.tolist(), **kwargs) + + return cls.from_dict_sympy(*M.shape, M.todod(), **kwargs) + + @classmethod + def get_domain(cls, items_sympy, **kwargs): + K, items_K = construct_domain(items_sympy, **kwargs) + return K, items_K + + def choose_domain(self, **opts): + """Convert to a domain found by :func:`~.construct_domain`. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> M = DM([[1, 2], [3, 4]], ZZ) + >>> M + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + >>> M.choose_domain(field=True) + DomainMatrix([[1, 2], [3, 4]], (2, 2), QQ) + + >>> from sympy.abc import x + >>> M = DM([[1, x], [x**2, x**3]], ZZ[x]) + >>> M.choose_domain(field=True).domain + ZZ(x) + + Keyword arguments are passed to :func:`~.construct_domain`. + + See Also + ======== + + construct_domain + convert_to + """ + elements, data = self.to_sympy().to_flat_nz() + dom, elements_dom = construct_domain(elements, **opts) + return self.from_flat_nz(elements_dom, data, dom) + + def copy(self): + return self.from_rep(self.rep.copy()) + + def convert_to(self, K): + r""" + Change the domain of DomainMatrix to desired domain or field + + Parameters + ========== + + K : Represents the desired domain or field. + Alternatively, ``None`` may be passed, in which case this method + just returns a copy of this DomainMatrix. + + Returns + ======= + + DomainMatrix + DomainMatrix with the desired domain or field + + Examples + ======== + + >>> from sympy import ZZ, ZZ_I + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.convert_to(ZZ_I) + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ_I) + + """ + if K == self.domain: + return self.copy() + + rep = self.rep + + # The DFM, DDM and SDM types do not do any implicit conversions so we + # manage switching between DDM and DFM here. + if rep.is_DFM and not DFM._supports_domain(K): + rep_K = rep.to_ddm().convert_to(K) + elif rep.is_DDM and DFM._supports_domain(K): + rep_K = rep.convert_to(K).to_dfm() + else: + rep_K = rep.convert_to(K) + + return self.from_rep(rep_K) + + def to_sympy(self): + return self.convert_to(EXRAW) + + def to_field(self): + r""" + Returns a DomainMatrix with the appropriate field + + Returns + ======= + + DomainMatrix + DomainMatrix with the appropriate field + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.to_field() + DomainMatrix([[1, 2], [3, 4]], (2, 2), QQ) + + """ + K = self.domain.get_field() + return self.convert_to(K) + + def to_sparse(self): + """ + Return a sparse DomainMatrix representation of *self*. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix([[1, 0],[0, 2]], (2, 2), QQ) + >>> A.rep + [[1, 0], [0, 2]] + >>> B = A.to_sparse() + >>> B.rep + {0: {0: 1}, 1: {1: 2}} + """ + if self.rep.fmt == 'sparse': + return self + + return self.from_rep(self.rep.to_sdm()) + + def to_dense(self): + """ + Return a dense DomainMatrix representation of *self*. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix({0: {0: 1}, 1: {1: 2}}, (2, 2), QQ) + >>> A.rep + {0: {0: 1}, 1: {1: 2}} + >>> B = A.to_dense() + >>> B.rep + [[1, 0], [0, 2]] + + """ + rep = self.rep + + if rep.fmt == 'dense': + return self + + return self.from_rep(rep.to_dfm_or_ddm()) + + def to_ddm(self): + """ + Return a :class:`~.DDM` representation of *self*. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix({0: {0: 1}, 1: {1: 2}}, (2, 2), QQ) + >>> ddm = A.to_ddm() + >>> ddm + [[1, 0], [0, 2]] + >>> type(ddm) + + + See Also + ======== + + to_sdm + to_dense + sympy.polys.matrices.ddm.DDM.to_sdm + """ + return self.rep.to_ddm() + + def to_sdm(self): + """ + Return a :class:`~.SDM` representation of *self*. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix([[1, 0],[0, 2]], (2, 2), QQ) + >>> sdm = A.to_sdm() + >>> sdm + {0: {0: 1}, 1: {1: 2}} + >>> type(sdm) + + + See Also + ======== + + to_ddm + to_sparse + sympy.polys.matrices.sdm.SDM.to_ddm + """ + return self.rep.to_sdm() + + @doctest_depends_on(ground_types=['flint']) + def to_dfm(self): + """ + Return a :class:`~.DFM` representation of *self*. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix([[1, 0],[0, 2]], (2, 2), QQ) + >>> dfm = A.to_dfm() + >>> dfm + [[1, 0], [0, 2]] + >>> type(dfm) + + + See Also + ======== + + to_ddm + to_dense + DFM + """ + return self.rep.to_dfm() + + @doctest_depends_on(ground_types=['flint']) + def to_dfm_or_ddm(self): + """ + Return a :class:`~.DFM` or :class:`~.DDM` representation of *self*. + + Explanation + =========== + + The :class:`~.DFM` representation can only be used if the ground types + are ``flint`` and the ground domain is supported by ``python-flint``. + This method will return a :class:`~.DFM` representation if possible, + but will return a :class:`~.DDM` representation otherwise. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> A = DomainMatrix([[1, 0],[0, 2]], (2, 2), QQ) + >>> dfm = A.to_dfm_or_ddm() + >>> dfm + [[1, 0], [0, 2]] + >>> type(dfm) # Depends on the ground domain and ground types + + + See Also + ======== + + to_ddm: Always return a :class:`~.DDM` representation. + to_dfm: Returns a :class:`~.DFM` representation or raise an error. + to_dense: Convert internally to a :class:`~.DFM` or :class:`~.DDM` + DFM: The :class:`~.DFM` dense FLINT matrix representation. + DDM: The Python :class:`~.DDM` dense domain matrix representation. + """ + return self.rep.to_dfm_or_ddm() + + @classmethod + def _unify_domain(cls, *matrices): + """Convert matrices to a common domain""" + domains = {matrix.domain for matrix in matrices} + if len(domains) == 1: + return matrices + domain = reduce(lambda x, y: x.unify(y), domains) + return tuple(matrix.convert_to(domain) for matrix in matrices) + + @classmethod + def _unify_fmt(cls, *matrices, fmt=None): + """Convert matrices to the same format. + + If all matrices have the same format, then return unmodified. + Otherwise convert both to the preferred format given as *fmt* which + should be 'dense' or 'sparse'. + """ + formats = {matrix.rep.fmt for matrix in matrices} + if len(formats) == 1: + return matrices + if fmt == 'sparse': + return tuple(matrix.to_sparse() for matrix in matrices) + elif fmt == 'dense': + return tuple(matrix.to_dense() for matrix in matrices) + else: + raise ValueError("fmt should be 'sparse' or 'dense'") + + def unify(self, *others, fmt=None): + """ + Unifies the domains and the format of self and other + matrices. + + Parameters + ========== + + others : DomainMatrix + + fmt: string 'dense', 'sparse' or `None` (default) + The preferred format to convert to if self and other are not + already in the same format. If `None` or not specified then no + conversion if performed. + + Returns + ======= + + Tuple[DomainMatrix] + Matrices with unified domain and format + + Examples + ======== + + Unify the domain of DomainMatrix that have different domains: + + >>> from sympy import ZZ, QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + >>> B = DomainMatrix([[QQ(1, 2), QQ(2)]], (1, 2), QQ) + >>> Aq, Bq = A.unify(B) + >>> Aq + DomainMatrix([[1, 2]], (1, 2), QQ) + >>> Bq + DomainMatrix([[1/2, 2]], (1, 2), QQ) + + Unify the format (dense or sparse): + + >>> A = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + >>> B = DomainMatrix({0:{0: ZZ(1)}}, (2, 2), ZZ) + >>> B.rep + {0: {0: 1}} + + >>> A2, B2 = A.unify(B, fmt='dense') + >>> B2.rep + [[1, 0], [0, 0]] + + See Also + ======== + + convert_to, to_dense, to_sparse + + """ + matrices = (self,) + others + matrices = DomainMatrix._unify_domain(*matrices) + if fmt is not None: + matrices = DomainMatrix._unify_fmt(*matrices, fmt=fmt) + return matrices + + def to_Matrix(self): + r""" + Convert DomainMatrix to Matrix + + Returns + ======= + + Matrix + MutableDenseMatrix for the DomainMatrix + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.to_Matrix() + Matrix([ + [1, 2], + [3, 4]]) + + See Also + ======== + + from_Matrix + + """ + from sympy.matrices.dense import MutableDenseMatrix + + # XXX: If the internal representation of RepMatrix changes then this + # might need to be changed also. + if self.domain in (ZZ, QQ, EXRAW): + if self.rep.fmt == "sparse": + rep = self.copy() + else: + rep = self.to_sparse() + else: + rep = self.convert_to(EXRAW).to_sparse() + + return MutableDenseMatrix._fromrep(rep) + + def to_list(self): + """ + Convert :class:`DomainMatrix` to list of lists. + + See Also + ======== + + from_list + to_list_flat + to_flat_nz + to_dok + """ + return self.rep.to_list() + + def to_list_flat(self): + """ + Convert :class:`DomainMatrix` to flat list. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> A.to_list_flat() + [1, 2, 3, 4] + + See Also + ======== + + from_list_flat + to_list + to_flat_nz + to_dok + """ + return self.rep.to_list_flat() + + @classmethod + def from_list_flat(cls, elements, shape, domain): + """ + Create :class:`DomainMatrix` from flat list. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> element_list = [ZZ(1), ZZ(2), ZZ(3), ZZ(4)] + >>> A = DomainMatrix.from_list_flat(element_list, (2, 2), ZZ) + >>> A + DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + >>> A == A.from_list_flat(A.to_list_flat(), A.shape, A.domain) + True + + See Also + ======== + + to_list_flat + """ + ddm = DDM.from_list_flat(elements, shape, domain) + return cls.from_rep(ddm.to_dfm_or_ddm()) + + def to_flat_nz(self): + """ + Convert :class:`DomainMatrix` to list of nonzero elements and data. + + Explanation + =========== + + Returns a tuple ``(elements, data)`` where ``elements`` is a list of + elements of the matrix with zeros possibly excluded. The matrix can be + reconstructed by passing these to :meth:`from_flat_nz`. The idea is to + be able to modify a flat list of the elements and then create a new + matrix of the same shape with the modified elements in the same + positions. + + The format of ``data`` differs depending on whether the underlying + representation is dense or sparse but either way it represents the + positions of the elements in the list in a way that + :meth:`from_flat_nz` can use to reconstruct the matrix. The + :meth:`from_flat_nz` method should be called on the same + :class:`DomainMatrix` that was used to call :meth:`to_flat_nz`. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> elements, data = A.to_flat_nz() + >>> elements + [1, 2, 3, 4] + >>> A == A.from_flat_nz(elements, data, A.domain) + True + + Create a matrix with the elements doubled: + + >>> elements_doubled = [2*x for x in elements] + >>> A2 = A.from_flat_nz(elements_doubled, data, A.domain) + >>> A2 == 2*A + True + + See Also + ======== + + from_flat_nz + """ + return self.rep.to_flat_nz() + + def from_flat_nz(self, elements, data, domain): + """ + Reconstruct :class:`DomainMatrix` after calling :meth:`to_flat_nz`. + + See :meth:`to_flat_nz` for explanation. + + See Also + ======== + + to_flat_nz + """ + rep = self.rep.from_flat_nz(elements, data, domain) + return self.from_rep(rep) + + def to_dod(self): + """ + Convert :class:`DomainMatrix` to dictionary of dictionaries (dod) format. + + Explanation + =========== + + Returns a dictionary of dictionaries representing the matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[ZZ(1), ZZ(2), ZZ(0)], [ZZ(3), ZZ(0), ZZ(4)]], ZZ) + >>> A.to_dod() + {0: {0: 1, 1: 2}, 1: {0: 3, 2: 4}} + >>> A.to_sparse() == A.from_dod(A.to_dod(), A.shape, A.domain) + True + >>> A == A.from_dod_like(A.to_dod()) + True + + See Also + ======== + + from_dod + from_dod_like + to_dok + to_list + to_list_flat + to_flat_nz + sympy.matrices.matrixbase.MatrixBase.todod + """ + return self.rep.to_dod() + + @classmethod + def from_dod(cls, dod, shape, domain): + """ + Create sparse :class:`DomainMatrix` from dict of dict (dod) format. + + See :meth:`to_dod` for explanation. + + See Also + ======== + + to_dod + from_dod_like + """ + return cls.from_rep(SDM.from_dod(dod, shape, domain)) + + def from_dod_like(self, dod, domain=None): + """ + Create :class:`DomainMatrix` like ``self`` from dict of dict (dod) format. + + See :meth:`to_dod` for explanation. + + See Also + ======== + + to_dod + from_dod + """ + if domain is None: + domain = self.domain + return self.from_rep(self.rep.from_dod(dod, self.shape, domain)) + + def to_dok(self): + """ + Convert :class:`DomainMatrix` to dictionary of keys (dok) format. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(0)], + ... [ZZ(0), ZZ(4)]], (2, 2), ZZ) + >>> A.to_dok() + {(0, 0): 1, (1, 1): 4} + + The matrix can be reconstructed by calling :meth:`from_dok` although + the reconstructed matrix will always be in sparse format: + + >>> A.to_sparse() == A.from_dok(A.to_dok(), A.shape, A.domain) + True + + See Also + ======== + + from_dok + to_list + to_list_flat + to_flat_nz + """ + return self.rep.to_dok() + + @classmethod + def from_dok(cls, dok, shape, domain): + """ + Create :class:`DomainMatrix` from dictionary of keys (dok) format. + + See :meth:`to_dok` for explanation. + + See Also + ======== + + to_dok + """ + return cls.from_rep(SDM.from_dok(dok, shape, domain)) + + def iter_values(self): + """ + Iterate over nonzero elements of the matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[ZZ(1), ZZ(0)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> list(A.iter_values()) + [1, 3, 4] + + See Also + ======== + + iter_items + to_list_flat + sympy.matrices.matrixbase.MatrixBase.iter_values + """ + return self.rep.iter_values() + + def iter_items(self): + """ + Iterate over indices and values of nonzero elements of the matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[ZZ(1), ZZ(0)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> list(A.iter_items()) + [((0, 0), 1), ((1, 0), 3), ((1, 1), 4)] + + See Also + ======== + + iter_values + to_dok + sympy.matrices.matrixbase.MatrixBase.iter_items + """ + return self.rep.iter_items() + + def nnz(self): + """ + Number of nonzero elements in the matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[1, 0], [0, 4]], ZZ) + >>> A.nnz() + 2 + """ + return self.rep.nnz() + + def __repr__(self): + return 'DomainMatrix(%s, %r, %r)' % (str(self.rep), self.shape, self.domain) + + def transpose(self): + """Matrix transpose of ``self``""" + return self.from_rep(self.rep.transpose()) + + def flat(self): + rows, cols = self.shape + return [self[i,j].element for i in range(rows) for j in range(cols)] + + @property + def is_zero_matrix(self): + return self.rep.is_zero_matrix() + + @property + def is_upper(self): + """ + Says whether this matrix is upper-triangular. True can be returned + even if the matrix is not square. + """ + return self.rep.is_upper() + + @property + def is_lower(self): + """ + Says whether this matrix is lower-triangular. True can be returned + even if the matrix is not square. + """ + return self.rep.is_lower() + + @property + def is_diagonal(self): + """ + True if the matrix is diagonal. + + Can return true for non-square matrices. A matrix is diagonal if + ``M[i,j] == 0`` whenever ``i != j``. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> M = DM([[ZZ(1), ZZ(0)], [ZZ(0), ZZ(1)]], ZZ) + >>> M.is_diagonal + True + + See Also + ======== + + is_upper + is_lower + is_square + diagonal + """ + return self.rep.is_diagonal() + + def diagonal(self): + """ + Get the diagonal entries of the matrix as a list. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> M = DM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], ZZ) + >>> M.diagonal() + [1, 4] + + See Also + ======== + + is_diagonal + diag + """ + return self.rep.diagonal() + + @property + def is_square(self): + """ + True if the matrix is square. + """ + return self.shape[0] == self.shape[1] + + def rank(self): + rref, pivots = self.rref() + return len(pivots) + + def hstack(A, *B): + r"""Horizontally stack the given matrices. + + Parameters + ========== + + B: DomainMatrix + Matrices to stack horizontally. + + Returns + ======= + + DomainMatrix + DomainMatrix by stacking horizontally. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + + >>> A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + >>> A.hstack(B) + DomainMatrix([[1, 2, 5, 6], [3, 4, 7, 8]], (2, 4), ZZ) + + >>> C = DomainMatrix([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + >>> A.hstack(B, C) + DomainMatrix([[1, 2, 5, 6, 9, 10], [3, 4, 7, 8, 11, 12]], (2, 6), ZZ) + + See Also + ======== + + unify + """ + A, *B = A.unify(*B, fmt=A.rep.fmt) + return DomainMatrix.from_rep(A.rep.hstack(*(Bk.rep for Bk in B))) + + def vstack(A, *B): + r"""Vertically stack the given matrices. + + Parameters + ========== + + B: DomainMatrix + Matrices to stack vertically. + + Returns + ======= + + DomainMatrix + DomainMatrix by stacking vertically. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + + >>> A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + >>> A.vstack(B) + DomainMatrix([[1, 2], [3, 4], [5, 6], [7, 8]], (4, 2), ZZ) + + >>> C = DomainMatrix([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + >>> A.vstack(B, C) + DomainMatrix([[1, 2], [3, 4], [5, 6], [7, 8], [9, 10], [11, 12]], (6, 2), ZZ) + + See Also + ======== + + unify + """ + A, *B = A.unify(*B, fmt='dense') + return DomainMatrix.from_rep(A.rep.vstack(*(Bk.rep for Bk in B))) + + def applyfunc(self, func, domain=None): + if domain is None: + domain = self.domain + return self.from_rep(self.rep.applyfunc(func, domain)) + + def __add__(A, B): + if not isinstance(B, DomainMatrix): + return NotImplemented + A, B = A.unify(B, fmt='dense') + return A.add(B) + + def __sub__(A, B): + if not isinstance(B, DomainMatrix): + return NotImplemented + A, B = A.unify(B, fmt='dense') + return A.sub(B) + + def __neg__(A): + return A.neg() + + def __mul__(A, B): + """A * B""" + if isinstance(B, DomainMatrix): + A, B = A.unify(B, fmt='dense') + return A.matmul(B) + elif B in A.domain: + return A.scalarmul(B) + elif isinstance(B, DomainScalar): + A, B = A.unify(B) + return A.scalarmul(B.element) + else: + return NotImplemented + + def __rmul__(A, B): + if B in A.domain: + return A.rscalarmul(B) + elif isinstance(B, DomainScalar): + A, B = A.unify(B) + return A.rscalarmul(B.element) + else: + return NotImplemented + + def __pow__(A, n): + """A ** n""" + if not isinstance(n, int): + return NotImplemented + return A.pow(n) + + def _check(a, op, b, ashape, bshape): + if a.domain != b.domain: + msg = "Domain mismatch: %s %s %s" % (a.domain, op, b.domain) + raise DMDomainError(msg) + if ashape != bshape: + msg = "Shape mismatch: %s %s %s" % (a.shape, op, b.shape) + raise DMShapeError(msg) + if a.rep.fmt != b.rep.fmt: + msg = "Format mismatch: %s %s %s" % (a.rep.fmt, op, b.rep.fmt) + raise DMFormatError(msg) + if type(a.rep) != type(b.rep): + msg = "Type mismatch: %s %s %s" % (type(a.rep), op, type(b.rep)) + raise DMFormatError(msg) + + def add(A, B): + r""" + Adds two DomainMatrix matrices of the same Domain + + Parameters + ========== + + A, B: DomainMatrix + matrices to add + + Returns + ======= + + DomainMatrix + DomainMatrix after Addition + + Raises + ====== + + DMShapeError + If the dimensions of the two DomainMatrix are not equal + + ValueError + If the domain of the two DomainMatrix are not same + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([ + ... [ZZ(4), ZZ(3)], + ... [ZZ(2), ZZ(1)]], (2, 2), ZZ) + + >>> A.add(B) + DomainMatrix([[5, 5], [5, 5]], (2, 2), ZZ) + + See Also + ======== + + sub, matmul + + """ + A._check('+', B, A.shape, B.shape) + return A.from_rep(A.rep.add(B.rep)) + + + def sub(A, B): + r""" + Subtracts two DomainMatrix matrices of the same Domain + + Parameters + ========== + + A, B: DomainMatrix + matrices to subtract + + Returns + ======= + + DomainMatrix + DomainMatrix after Subtraction + + Raises + ====== + + DMShapeError + If the dimensions of the two DomainMatrix are not equal + + ValueError + If the domain of the two DomainMatrix are not same + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([ + ... [ZZ(4), ZZ(3)], + ... [ZZ(2), ZZ(1)]], (2, 2), ZZ) + + >>> A.sub(B) + DomainMatrix([[-3, -1], [1, 3]], (2, 2), ZZ) + + See Also + ======== + + add, matmul + + """ + A._check('-', B, A.shape, B.shape) + return A.from_rep(A.rep.sub(B.rep)) + + def neg(A): + r""" + Returns the negative of DomainMatrix + + Parameters + ========== + + A : Represents a DomainMatrix + + Returns + ======= + + DomainMatrix + DomainMatrix after Negation + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.neg() + DomainMatrix([[-1, -2], [-3, -4]], (2, 2), ZZ) + + """ + return A.from_rep(A.rep.neg()) + + def mul(A, b): + r""" + Performs term by term multiplication for the second DomainMatrix + w.r.t first DomainMatrix. Returns a DomainMatrix whose rows are + list of DomainMatrix matrices created after term by term multiplication. + + Parameters + ========== + + A, B: DomainMatrix + matrices to multiply term-wise + + Returns + ======= + + DomainMatrix + DomainMatrix after term by term multiplication + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> b = ZZ(2) + + >>> A.mul(b) + DomainMatrix([[2, 4], [6, 8]], (2, 2), ZZ) + + See Also + ======== + + matmul + + """ + return A.from_rep(A.rep.mul(b)) + + def rmul(A, b): + return A.from_rep(A.rep.rmul(b)) + + def matmul(A, B): + r""" + Performs matrix multiplication of two DomainMatrix matrices + + Parameters + ========== + + A, B: DomainMatrix + to multiply + + Returns + ======= + + DomainMatrix + DomainMatrix after multiplication + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([ + ... [ZZ(1), ZZ(1)], + ... [ZZ(0), ZZ(1)]], (2, 2), ZZ) + + >>> A.matmul(B) + DomainMatrix([[1, 3], [3, 7]], (2, 2), ZZ) + + See Also + ======== + + mul, pow, add, sub + + """ + + A._check('*', B, A.shape[1], B.shape[0]) + return A.from_rep(A.rep.matmul(B.rep)) + + def _scalarmul(A, lamda, reverse): + if lamda == A.domain.zero: + return DomainMatrix.zeros(A.shape, A.domain) + elif lamda == A.domain.one: + return A.copy() + elif reverse: + return A.rmul(lamda) + else: + return A.mul(lamda) + + def scalarmul(A, lamda): + return A._scalarmul(lamda, reverse=False) + + def rscalarmul(A, lamda): + return A._scalarmul(lamda, reverse=True) + + def mul_elementwise(A, B): + assert A.domain == B.domain + return A.from_rep(A.rep.mul_elementwise(B.rep)) + + def __truediv__(A, lamda): + """ Method for Scalar Division""" + if isinstance(lamda, int) or ZZ.of_type(lamda): + lamda = DomainScalar(ZZ(lamda), ZZ) + elif A.domain.is_Field and lamda in A.domain: + K = A.domain + lamda = DomainScalar(K.convert(lamda), K) + + if not isinstance(lamda, DomainScalar): + return NotImplemented + + A, lamda = A.to_field().unify(lamda) + if lamda.element == lamda.domain.zero: + raise ZeroDivisionError + if lamda.element == lamda.domain.one: + return A + + return A.mul(1 / lamda.element) + + def pow(A, n): + r""" + Computes A**n + + Parameters + ========== + + A : DomainMatrix + + n : exponent for A + + Returns + ======= + + DomainMatrix + DomainMatrix on computing A**n + + Raises + ====== + + NotImplementedError + if n is negative. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(1)], + ... [ZZ(0), ZZ(1)]], (2, 2), ZZ) + + >>> A.pow(2) + DomainMatrix([[1, 2], [0, 1]], (2, 2), ZZ) + + See Also + ======== + + matmul + + """ + nrows, ncols = A.shape + if nrows != ncols: + raise DMNonSquareMatrixError('Power of a nonsquare matrix') + if n < 0: + raise NotImplementedError('Negative powers') + elif n == 0: + return A.eye(nrows, A.domain) + elif n == 1: + return A + elif n % 2 == 1: + return A * A**(n - 1) + else: + sqrtAn = A ** (n // 2) + return sqrtAn * sqrtAn + + def scc(self): + """Compute the strongly connected components of a DomainMatrix + + Explanation + =========== + + A square matrix can be considered as the adjacency matrix for a + directed graph where the row and column indices are the vertices. In + this graph if there is an edge from vertex ``i`` to vertex ``j`` if + ``M[i, j]`` is nonzero. This routine computes the strongly connected + components of that graph which are subsets of the rows and columns that + are connected by some nonzero element of the matrix. The strongly + connected components are useful because many operations such as the + determinant can be computed by working with the submatrices + corresponding to each component. + + Examples + ======== + + Find the strongly connected components of a matrix: + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> M = DomainMatrix([[ZZ(1), ZZ(0), ZZ(2)], + ... [ZZ(0), ZZ(3), ZZ(0)], + ... [ZZ(4), ZZ(6), ZZ(5)]], (3, 3), ZZ) + >>> M.scc() + [[1], [0, 2]] + + Compute the determinant from the components: + + >>> MM = M.to_Matrix() + >>> MM + Matrix([ + [1, 0, 2], + [0, 3, 0], + [4, 6, 5]]) + >>> MM[[1], [1]] + Matrix([[3]]) + >>> MM[[0, 2], [0, 2]] + Matrix([ + [1, 2], + [4, 5]]) + >>> MM.det() + -9 + >>> MM[[1], [1]].det() * MM[[0, 2], [0, 2]].det() + -9 + + The components are given in reverse topological order and represent a + permutation of the rows and columns that will bring the matrix into + block lower-triangular form: + + >>> MM[[1, 0, 2], [1, 0, 2]] + Matrix([ + [3, 0, 0], + [0, 1, 2], + [6, 4, 5]]) + + Returns + ======= + + List of lists of integers + Each list represents a strongly connected component. + + See also + ======== + + sympy.matrices.matrixbase.MatrixBase.strongly_connected_components + sympy.utilities.iterables.strongly_connected_components + + """ + if not self.is_square: + raise DMNonSquareMatrixError('Matrix must be square for scc') + + return self.rep.scc() + + def clear_denoms(self, convert=False): + """ + Clear denominators, but keep the domain unchanged. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([[(1,2), (1,3)], [(1,4), (1,5)]], QQ) + >>> den, Anum = A.clear_denoms() + >>> den.to_sympy() + 60 + >>> Anum.to_Matrix() + Matrix([ + [30, 20], + [15, 12]]) + >>> den * A == Anum + True + + The numerator matrix will be in the same domain as the original matrix + unless ``convert`` is set to ``True``: + + >>> A.clear_denoms()[1].domain + QQ + >>> A.clear_denoms(convert=True)[1].domain + ZZ + + The denominator is always in the associated ring: + + >>> A.clear_denoms()[0].domain + ZZ + >>> A.domain.get_ring() + ZZ + + See Also + ======== + + sympy.polys.polytools.Poly.clear_denoms + clear_denoms_rowwise + """ + elems0, data = self.to_flat_nz() + + K0 = self.domain + K1 = K0.get_ring() if K0.has_assoc_Ring else K0 + + den, elems1 = dup_clear_denoms(elems0, K0, K1, convert=convert) + + if convert: + Kden, Knum = K1, K1 + else: + Kden, Knum = K1, K0 + + den = DomainScalar(den, Kden) + num = self.from_flat_nz(elems1, data, Knum) + + return den, num + + def clear_denoms_rowwise(self, convert=False): + """ + Clear denominators from each row of the matrix. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([[(1,2), (1,3), (1,4)], [(1,5), (1,6), (1,7)]], QQ) + >>> den, Anum = A.clear_denoms_rowwise() + >>> den.to_Matrix() + Matrix([ + [12, 0], + [ 0, 210]]) + >>> Anum.to_Matrix() + Matrix([ + [ 6, 4, 3], + [42, 35, 30]]) + + The denominator matrix is a diagonal matrix with the denominators of + each row on the diagonal. The invariants are: + + >>> den * A == Anum + True + >>> A == den.to_field().inv() * Anum + True + + The numerator matrix will be in the same domain as the original matrix + unless ``convert`` is set to ``True``: + + >>> A.clear_denoms_rowwise()[1].domain + QQ + >>> A.clear_denoms_rowwise(convert=True)[1].domain + ZZ + + The domain of the denominator matrix is the associated ring: + + >>> A.clear_denoms_rowwise()[0].domain + ZZ + + See Also + ======== + + sympy.polys.polytools.Poly.clear_denoms + clear_denoms + """ + dod = self.to_dod() + + K0 = self.domain + K1 = K0.get_ring() if K0.has_assoc_Ring else K0 + + diagonals = [K0.one] * self.shape[0] + dod_num = {} + for i, rowi in dod.items(): + indices, elems = zip(*rowi.items()) + den, elems_num = dup_clear_denoms(elems, K0, K1, convert=convert) + rowi_num = dict(zip(indices, elems_num)) + diagonals[i] = den + dod_num[i] = rowi_num + + if convert: + Kden, Knum = K1, K1 + else: + Kden, Knum = K1, K0 + + den = self.diag(diagonals, Kden) + num = self.from_dod_like(dod_num, Knum) + + return den, num + + def cancel_denom(self, denom): + """ + Cancel factors between a matrix and a denominator. + + Returns a matrix and denominator on lowest terms. + + Requires ``gcd`` in the ground domain. + + Methods like :meth:`solve_den`, :meth:`inv_den` and :meth:`rref_den` + return a matrix and denominator but not necessarily on lowest terms. + Reduction to lowest terms without fractions can be performed with + :meth:`cancel_denom`. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[2, 2, 0], + ... [0, 2, 2], + ... [0, 0, 2]], ZZ) + >>> Minv, den = M.inv_den() + >>> Minv.to_Matrix() + Matrix([ + [1, -1, 1], + [0, 1, -1], + [0, 0, 1]]) + >>> den + 2 + >>> Minv_reduced, den_reduced = Minv.cancel_denom(den) + >>> Minv_reduced.to_Matrix() + Matrix([ + [1, -1, 1], + [0, 1, -1], + [0, 0, 1]]) + >>> den_reduced + 2 + >>> Minv_reduced.to_field() / den_reduced == Minv.to_field() / den + True + + The denominator is made canonical with respect to units (e.g. a + negative denominator is made positive): + + >>> M = DM([[2, 2, 0]], ZZ) + >>> den = ZZ(-4) + >>> M.cancel_denom(den) + (DomainMatrix([[-1, -1, 0]], (1, 3), ZZ), 2) + + Any factor common to _all_ elements will be cancelled but there can + still be factors in common between _some_ elements of the matrix and + the denominator. To cancel factors between each element and the + denominator, use :meth:`cancel_denom_elementwise` or otherwise convert + to a field and use division: + + >>> M = DM([[4, 6]], ZZ) + >>> den = ZZ(12) + >>> M.cancel_denom(den) + (DomainMatrix([[2, 3]], (1, 2), ZZ), 6) + >>> numers, denoms = M.cancel_denom_elementwise(den) + >>> numers + DomainMatrix([[1, 1]], (1, 2), ZZ) + >>> denoms + DomainMatrix([[3, 2]], (1, 2), ZZ) + >>> M.to_field() / den + DomainMatrix([[1/3, 1/2]], (1, 2), QQ) + + See Also + ======== + + solve_den + inv_den + rref_den + cancel_denom_elementwise + """ + M = self + K = self.domain + + if K.is_zero(denom): + raise ZeroDivisionError('denominator is zero') + elif K.is_one(denom): + return (M.copy(), denom) + + elements, data = M.to_flat_nz() + + # First canonicalize the denominator (e.g. multiply by -1). + if K.is_negative(denom): + u = -K.one + else: + u = K.canonical_unit(denom) + + # Often after e.g. solve_den the denominator will be much more + # complicated than the elements of the numerator. Hopefully it will be + # quicker to find the gcd of the numerator and if there is no content + # then we do not need to look at the denominator at all. + content = dup_content(elements, K) + common = K.gcd(content, denom) + + if not K.is_one(content): + + common = K.gcd(content, denom) + + if not K.is_one(common): + elements = dup_quo_ground(elements, common, K) + denom = K.quo(denom, common) + + if not K.is_one(u): + elements = dup_mul_ground(elements, u, K) + denom = u * denom + elif K.is_one(common): + return (M.copy(), denom) + + M_cancelled = M.from_flat_nz(elements, data, K) + + return M_cancelled, denom + + def cancel_denom_elementwise(self, denom): + """ + Cancel factors between the elements of a matrix and a denominator. + + Returns a matrix of numerators and matrix of denominators. + + Requires ``gcd`` in the ground domain. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[2, 3], [4, 12]], ZZ) + >>> denom = ZZ(6) + >>> numers, denoms = M.cancel_denom_elementwise(denom) + >>> numers.to_Matrix() + Matrix([ + [1, 1], + [2, 2]]) + >>> denoms.to_Matrix() + Matrix([ + [3, 2], + [3, 1]]) + >>> M_frac = (M.to_field() / denom).to_Matrix() + >>> M_frac + Matrix([ + [1/3, 1/2], + [2/3, 2]]) + >>> denoms_inverted = denoms.to_Matrix().applyfunc(lambda e: 1/e) + >>> numers.to_Matrix().multiply_elementwise(denoms_inverted) == M_frac + True + + Use :meth:`cancel_denom` to cancel factors between the matrix and the + denominator while preserving the form of a matrix with a scalar + denominator. + + See Also + ======== + + cancel_denom + """ + K = self.domain + M = self + + if K.is_zero(denom): + raise ZeroDivisionError('denominator is zero') + elif K.is_one(denom): + M_numers = M.copy() + M_denoms = M.ones(M.shape, M.domain) + return (M_numers, M_denoms) + + elements, data = M.to_flat_nz() + + cofactors = [K.cofactors(numer, denom) for numer in elements] + gcds, numers, denoms = zip(*cofactors) + + M_numers = M.from_flat_nz(list(numers), data, K) + M_denoms = M.from_flat_nz(list(denoms), data, K) + + return (M_numers, M_denoms) + + def content(self): + """ + Return the gcd of the elements of the matrix. + + Requires ``gcd`` in the ground domain. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[2, 4], [4, 12]], ZZ) + >>> M.content() + 2 + + See Also + ======== + + primitive + cancel_denom + """ + K = self.domain + elements, _ = self.to_flat_nz() + return dup_content(elements, K) + + def primitive(self): + """ + Factor out gcd of the elements of a matrix. + + Requires ``gcd`` in the ground domain. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[2, 4], [4, 12]], ZZ) + >>> content, M_primitive = M.primitive() + >>> content + 2 + >>> M_primitive + DomainMatrix([[1, 2], [2, 6]], (2, 2), ZZ) + >>> content * M_primitive == M + True + >>> M_primitive.content() == ZZ(1) + True + + See Also + ======== + + content + cancel_denom + """ + K = self.domain + elements, data = self.to_flat_nz() + content, prims = dup_primitive(elements, K) + M_primitive = self.from_flat_nz(prims, data, K) + return content, M_primitive + + def rref(self, *, method='auto'): + r""" + Returns reduced-row echelon form (RREF) and list of pivots. + + If the domain is not a field then it will be converted to a field. See + :meth:`rref_den` for the fraction-free version of this routine that + returns RREF with denominator instead. + + The domain must either be a field or have an associated fraction field + (see :meth:`to_field`). + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(2), QQ(-1), QQ(0)], + ... [QQ(-1), QQ(2), QQ(-1)], + ... [QQ(0), QQ(0), QQ(2)]], (3, 3), QQ) + + >>> rref_matrix, rref_pivots = A.rref() + >>> rref_matrix + DomainMatrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]], (3, 3), QQ) + >>> rref_pivots + (0, 1, 2) + + Parameters + ========== + + method : str, optional (default: 'auto') + The method to use to compute the RREF. The default is ``'auto'``, + which will attempt to choose the fastest method. The other options + are: + + - ``A.rref(method='GJ')`` uses Gauss-Jordan elimination with + division. If the domain is not a field then it will be converted + to a field with :meth:`to_field` first and RREF will be computed + by inverting the pivot elements in each row. This is most + efficient for very sparse matrices or for matrices whose elements + have complex denominators. + + - ``A.rref(method='FF')`` uses fraction-free Gauss-Jordan + elimination. Elimination is performed using exact division + (``exquo``) to control the growth of the coefficients. In this + case the current domain is always used for elimination but if + the domain is not a field then it will be converted to a field + at the end and divided by the denominator. This is most efficient + for dense matrices or for matrices with simple denominators. + + - ``A.rref(method='CD')`` clears the denominators before using + fraction-free Gauss-Jordan elimination in the associated ring. + This is most efficient for dense matrices with very simple + denominators. + + - ``A.rref(method='GJ_dense')``, ``A.rref(method='FF_dense')``, and + ``A.rref(method='CD_dense')`` are the same as the above methods + except that the dense implementations of the algorithms are used. + By default ``A.rref(method='auto')`` will usually choose the + sparse implementations for RREF. + + Regardless of which algorithm is used the returned matrix will + always have the same format (sparse or dense) as the input and its + domain will always be the field of fractions of the input domain. + + Returns + ======= + + (DomainMatrix, list) + reduced-row echelon form and list of pivots for the DomainMatrix + + See Also + ======== + + rref_den + RREF with denominator + sympy.polys.matrices.sdm.sdm_irref + Sparse implementation of ``method='GJ'``. + sympy.polys.matrices.sdm.sdm_rref_den + Sparse implementation of ``method='FF'`` and ``method='CD'``. + sympy.polys.matrices.dense.ddm_irref + Dense implementation of ``method='GJ'``. + sympy.polys.matrices.dense.ddm_irref_den + Dense implementation of ``method='FF'`` and ``method='CD'``. + clear_denoms + Clear denominators from a matrix, used by ``method='CD'`` and + by ``method='GJ'`` when the original domain is not a field. + + """ + return _dm_rref(self, method=method) + + def rref_den(self, *, method='auto', keep_domain=True): + r""" + Returns reduced-row echelon form with denominator and list of pivots. + + Requires exact division in the ground domain (``exquo``). + + Examples + ======== + + >>> from sympy import ZZ, QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(2), ZZ(-1), ZZ(0)], + ... [ZZ(-1), ZZ(2), ZZ(-1)], + ... [ZZ(0), ZZ(0), ZZ(2)]], (3, 3), ZZ) + + >>> A_rref, denom, pivots = A.rref_den() + >>> A_rref + DomainMatrix([[6, 0, 0], [0, 6, 0], [0, 0, 6]], (3, 3), ZZ) + >>> denom + 6 + >>> pivots + (0, 1, 2) + >>> A_rref.to_field() / denom + DomainMatrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]], (3, 3), QQ) + >>> A_rref.to_field() / denom == A.convert_to(QQ).rref()[0] + True + + Parameters + ========== + + method : str, optional (default: 'auto') + The method to use to compute the RREF. The default is ``'auto'``, + which will attempt to choose the fastest method. The other options + are: + + - ``A.rref(method='FF')`` uses fraction-free Gauss-Jordan + elimination. Elimination is performed using exact division + (``exquo``) to control the growth of the coefficients. In this + case the current domain is always used for elimination and the + result is always returned as a matrix over the current domain. + This is most efficient for dense matrices or for matrices with + simple denominators. + + - ``A.rref(method='CD')`` clears denominators before using + fraction-free Gauss-Jordan elimination in the associated ring. + The result will be converted back to the original domain unless + ``keep_domain=False`` is passed in which case the result will be + over the ring used for elimination. This is most efficient for + dense matrices with very simple denominators. + + - ``A.rref(method='GJ')`` uses Gauss-Jordan elimination with + division. If the domain is not a field then it will be converted + to a field with :meth:`to_field` first and RREF will be computed + by inverting the pivot elements in each row. The result is + converted back to the original domain by clearing denominators + unless ``keep_domain=False`` is passed in which case the result + will be over the field used for elimination. This is most + efficient for very sparse matrices or for matrices whose elements + have complex denominators. + + - ``A.rref(method='GJ_dense')``, ``A.rref(method='FF_dense')``, and + ``A.rref(method='CD_dense')`` are the same as the above methods + except that the dense implementations of the algorithms are used. + By default ``A.rref(method='auto')`` will usually choose the + sparse implementations for RREF. + + Regardless of which algorithm is used the returned matrix will + always have the same format (sparse or dense) as the input and if + ``keep_domain=True`` its domain will always be the same as the + input. + + keep_domain : bool, optional + If True (the default), the domain of the returned matrix and + denominator are the same as the domain of the input matrix. If + False, the domain of the returned matrix might be changed to an + associated ring or field if the algorithm used a different domain. + This is useful for efficiency if the caller does not need the + result to be in the original domain e.g. it avoids clearing + denominators in the case of ``A.rref(method='GJ')``. + + Returns + ======= + + (DomainMatrix, scalar, list) + Reduced-row echelon form, denominator and list of pivot indices. + + See Also + ======== + + rref + RREF without denominator for field domains. + sympy.polys.matrices.sdm.sdm_irref + Sparse implementation of ``method='GJ'``. + sympy.polys.matrices.sdm.sdm_rref_den + Sparse implementation of ``method='FF'`` and ``method='CD'``. + sympy.polys.matrices.dense.ddm_irref + Dense implementation of ``method='GJ'``. + sympy.polys.matrices.dense.ddm_irref_den + Dense implementation of ``method='FF'`` and ``method='CD'``. + clear_denoms + Clear denominators from a matrix, used by ``method='CD'``. + + """ + return _dm_rref_den(self, method=method, keep_domain=keep_domain) + + def columnspace(self): + r""" + Returns the columnspace for the DomainMatrix + + Returns + ======= + + DomainMatrix + The columns of this matrix form a basis for the columnspace. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(1), QQ(-1)], + ... [QQ(2), QQ(-2)]], (2, 2), QQ) + >>> A.columnspace() + DomainMatrix([[1], [2]], (2, 1), QQ) + + """ + if not self.domain.is_Field: + raise DMNotAField('Not a field') + rref, pivots = self.rref() + rows, cols = self.shape + return self.extract(range(rows), pivots) + + def rowspace(self): + r""" + Returns the rowspace for the DomainMatrix + + Returns + ======= + + DomainMatrix + The rows of this matrix form a basis for the rowspace. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(1), QQ(-1)], + ... [QQ(2), QQ(-2)]], (2, 2), QQ) + >>> A.rowspace() + DomainMatrix([[1, -1]], (1, 2), QQ) + + """ + if not self.domain.is_Field: + raise DMNotAField('Not a field') + rref, pivots = self.rref() + rows, cols = self.shape + return self.extract(range(len(pivots)), range(cols)) + + def nullspace(self, divide_last=False): + r""" + Returns the nullspace for the DomainMatrix + + Returns + ======= + + DomainMatrix + The rows of this matrix form a basis for the nullspace. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([ + ... [QQ(2), QQ(-2)], + ... [QQ(4), QQ(-4)]], QQ) + >>> A.nullspace() + DomainMatrix([[1, 1]], (1, 2), QQ) + + The returned matrix is a basis for the nullspace: + + >>> A_null = A.nullspace().transpose() + >>> A * A_null + DomainMatrix([[0], [0]], (2, 1), QQ) + >>> rows, cols = A.shape + >>> nullity = rows - A.rank() + >>> A_null.shape == (cols, nullity) + True + + Nullspace can also be computed for non-field rings. If the ring is not + a field then division is not used. Setting ``divide_last`` to True will + raise an error in this case: + + >>> from sympy import ZZ + >>> B = DM([[6, -3], + ... [4, -2]], ZZ) + >>> B.nullspace() + DomainMatrix([[3, 6]], (1, 2), ZZ) + >>> B.nullspace(divide_last=True) + Traceback (most recent call last): + ... + DMNotAField: Cannot normalize vectors over a non-field + + Over a ring with ``gcd`` defined the nullspace can potentially be + reduced with :meth:`primitive`: + + >>> B.nullspace().primitive() + (3, DomainMatrix([[1, 2]], (1, 2), ZZ)) + + A matrix over a ring can often be normalized by converting it to a + field but it is often a bad idea to do so: + + >>> from sympy.abc import a, b, c + >>> from sympy import Matrix + >>> M = Matrix([[ a*b, b + c, c], + ... [ a - b, b*c, c**2], + ... [a*b + a - b, b*c + b + c, c**2 + c]]) + >>> M.to_DM().domain + ZZ[a,b,c] + >>> M.to_DM().nullspace().to_Matrix().transpose() + Matrix([ + [ c**3], + [ -a*b*c**2 + a*c - b*c], + [a*b**2*c - a*b - a*c + b**2 + b*c]]) + + The unnormalized form here is nicer than the normalized form that + spreads a large denominator throughout the matrix: + + >>> M.to_DM().to_field().nullspace(divide_last=True).to_Matrix().transpose() + Matrix([ + [ c**3/(a*b**2*c - a*b - a*c + b**2 + b*c)], + [(-a*b*c**2 + a*c - b*c)/(a*b**2*c - a*b - a*c + b**2 + b*c)], + [ 1]]) + + Parameters + ========== + + divide_last : bool, optional + If False (the default), the vectors are not normalized and the RREF + is computed using :meth:`rref_den` and the denominator is + discarded. If True, then each row is divided by its final element; + the domain must be a field in this case. + + See Also + ======== + + nullspace_from_rref + rref + rref_den + rowspace + """ + A = self + K = A.domain + + if divide_last and not K.is_Field: + raise DMNotAField("Cannot normalize vectors over a non-field") + + if divide_last: + A_rref, pivots = A.rref() + else: + A_rref, den, pivots = A.rref_den() + + # Ensure that the sign is canonical before discarding the + # denominator. Then M.nullspace().primitive() is canonical. + u = K.canonical_unit(den) + if u != K.one: + A_rref *= u + + A_null = A_rref.nullspace_from_rref(pivots) + + return A_null + + def nullspace_from_rref(self, pivots=None): + """ + Compute nullspace from rref and pivots. + + The domain of the matrix can be any domain. + + The matrix must be in reduced row echelon form already. Otherwise the + result will be incorrect. Use :meth:`rref` or :meth:`rref_den` first + to get the reduced row echelon form or use :meth:`nullspace` instead. + + See Also + ======== + + nullspace + rref + rref_den + sympy.polys.matrices.sdm.SDM.nullspace_from_rref + sympy.polys.matrices.ddm.DDM.nullspace_from_rref + """ + null_rep, nonpivots = self.rep.nullspace_from_rref(pivots) + return self.from_rep(null_rep) + + def inv(self): + r""" + Finds the inverse of the DomainMatrix if exists + + Returns + ======= + + DomainMatrix + DomainMatrix after inverse + + Raises + ====== + + ValueError + If the domain of DomainMatrix not a Field + + DMNonSquareMatrixError + If the DomainMatrix is not a not Square DomainMatrix + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(2), QQ(-1), QQ(0)], + ... [QQ(-1), QQ(2), QQ(-1)], + ... [QQ(0), QQ(0), QQ(2)]], (3, 3), QQ) + >>> A.inv() + DomainMatrix([[2/3, 1/3, 1/6], [1/3, 2/3, 1/3], [0, 0, 1/2]], (3, 3), QQ) + + See Also + ======== + + neg + + """ + if not self.domain.is_Field: + raise DMNotAField('Not a field') + m, n = self.shape + if m != n: + raise DMNonSquareMatrixError + inv = self.rep.inv() + return self.from_rep(inv) + + def det(self): + r""" + Returns the determinant of a square :class:`DomainMatrix`. + + Returns + ======= + + determinant: DomainElement + Determinant of the matrix. + + Raises + ====== + + ValueError + If the domain of DomainMatrix is not a Field + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.det() + -2 + + """ + m, n = self.shape + if m != n: + raise DMNonSquareMatrixError + return self.rep.det() + + def adj_det(self): + """ + Adjugate and determinant of a square :class:`DomainMatrix`. + + Returns + ======= + + (adjugate, determinant) : (DomainMatrix, DomainScalar) + The adjugate matrix and determinant of this matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], ZZ) + >>> adjA, detA = A.adj_det() + >>> adjA + DomainMatrix([[4, -2], [-3, 1]], (2, 2), ZZ) + >>> detA + -2 + + See Also + ======== + + adjugate + Returns only the adjugate matrix. + det + Returns only the determinant. + inv_den + Returns a matrix/denominator pair representing the inverse matrix + but perhaps differing from the adjugate and determinant by a common + factor. + """ + m, n = self.shape + I_m = self.eye((m, m), self.domain) + adjA, detA = self.solve_den_charpoly(I_m, check=False) + if self.rep.fmt == "dense": + adjA = adjA.to_dense() + return adjA, detA + + def adjugate(self): + """ + Adjugate of a square :class:`DomainMatrix`. + + The adjugate matrix is the transpose of the cofactor matrix and is + related to the inverse by:: + + adj(A) = det(A) * A.inv() + + Unlike the inverse matrix the adjugate matrix can be computed and + expressed without division or fractions in the ground domain. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], ZZ) + >>> A.adjugate() + DomainMatrix([[4, -2], [-3, 1]], (2, 2), ZZ) + + Returns + ======= + + DomainMatrix + The adjugate matrix of this matrix with the same domain. + + See Also + ======== + + adj_det + """ + adjA, detA = self.adj_det() + return adjA + + def inv_den(self, method=None): + """ + Return the inverse as a :class:`DomainMatrix` with denominator. + + Returns + ======= + + (inv, den) : (:class:`DomainMatrix`, :class:`~.DomainElement`) + The inverse matrix and its denominator. + + This is more or less equivalent to :meth:`adj_det` except that ``inv`` + and ``den`` are not guaranteed to be the adjugate and inverse. The + ratio ``inv/den`` is equivalent to ``adj/det`` but some factors + might be cancelled between ``inv`` and ``den``. In simple cases this + might just be a minus sign so that ``(inv, den) == (-adj, -det)`` but + factors more complicated than ``-1`` can also be cancelled. + Cancellation is not guaranteed to be complete so ``inv`` and ``den`` + may not be on lowest terms. The denominator ``den`` will be zero if and + only if the determinant is zero. + + If the actual adjugate and determinant are needed, use :meth:`adj_det` + instead. If the intention is to compute the inverse matrix or solve a + system of equations then :meth:`inv_den` is more efficient. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(2), ZZ(-1), ZZ(0)], + ... [ZZ(-1), ZZ(2), ZZ(-1)], + ... [ZZ(0), ZZ(0), ZZ(2)]], (3, 3), ZZ) + >>> Ainv, den = A.inv_den() + >>> den + 6 + >>> Ainv + DomainMatrix([[4, 2, 1], [2, 4, 2], [0, 0, 3]], (3, 3), ZZ) + >>> A * Ainv == den * A.eye(A.shape, A.domain).to_dense() + True + + Parameters + ========== + + method : str, optional + The method to use to compute the inverse. Can be one of ``None``, + ``'rref'`` or ``'charpoly'``. If ``None`` then the method is + chosen automatically (see :meth:`solve_den` for details). + + See Also + ======== + + inv + det + adj_det + solve_den + """ + I = self.eye(self.shape, self.domain) + return self.solve_den(I, method=method) + + def solve_den(self, b, method=None): + """ + Solve matrix equation $Ax = b$ without fractions in the ground domain. + + Examples + ======== + + Solve a matrix equation over the integers: + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], ZZ) + >>> b = DM([[ZZ(5)], [ZZ(6)]], ZZ) + >>> xnum, xden = A.solve_den(b) + >>> xden + -2 + >>> xnum + DomainMatrix([[8], [-9]], (2, 1), ZZ) + >>> A * xnum == xden * b + True + + Solve a matrix equation over a polynomial ring: + + >>> from sympy import ZZ + >>> from sympy.abc import x, y, z, a, b + >>> R = ZZ[x, y, z, a, b] + >>> M = DM([[x*y, x*z], [y*z, x*z]], R) + >>> b = DM([[a], [b]], R) + >>> M.to_Matrix() + Matrix([ + [x*y, x*z], + [y*z, x*z]]) + >>> b.to_Matrix() + Matrix([ + [a], + [b]]) + >>> xnum, xden = M.solve_den(b) + >>> xden + x**2*y*z - x*y*z**2 + >>> xnum.to_Matrix() + Matrix([ + [ a*x*z - b*x*z], + [-a*y*z + b*x*y]]) + >>> M * xnum == xden * b + True + + The solution can be expressed over a fraction field which will cancel + gcds between the denominator and the elements of the numerator: + + >>> xsol = xnum.to_field() / xden + >>> xsol.to_Matrix() + Matrix([ + [ (a - b)/(x*y - y*z)], + [(-a*z + b*x)/(x**2*z - x*z**2)]]) + >>> (M * xsol).to_Matrix() == b.to_Matrix() + True + + When solving a large system of equations this cancellation step might + be a lot slower than :func:`solve_den` itself. The solution can also be + expressed as a ``Matrix`` without attempting any polynomial + cancellation between the numerator and denominator giving a less + simplified result more quickly: + + >>> xsol_uncancelled = xnum.to_Matrix() / xnum.domain.to_sympy(xden) + >>> xsol_uncancelled + Matrix([ + [ (a*x*z - b*x*z)/(x**2*y*z - x*y*z**2)], + [(-a*y*z + b*x*y)/(x**2*y*z - x*y*z**2)]]) + >>> from sympy import cancel + >>> cancel(xsol_uncancelled) == xsol.to_Matrix() + True + + Parameters + ========== + + self : :class:`DomainMatrix` + The ``m x n`` matrix $A$ in the equation $Ax = b$. Underdetermined + systems are not supported so ``m >= n``: $A$ should be square or + have more rows than columns. + b : :class:`DomainMatrix` + The ``n x m`` matrix $b$ for the rhs. + cp : list of :class:`~.DomainElement`, optional + The characteristic polynomial of the matrix $A$. If not given, it + will be computed using :meth:`charpoly`. + method: str, optional + The method to use for solving the system. Can be one of ``None``, + ``'charpoly'`` or ``'rref'``. If ``None`` (the default) then the + method will be chosen automatically. + + The ``charpoly`` method uses :meth:`solve_den_charpoly` and can + only be used if the matrix is square. This method is division free + and can be used with any domain. + + The ``rref`` method is fraction free but requires exact division + in the ground domain (``exquo``). This is also suitable for most + domains. This method can be used with overdetermined systems (more + equations than unknowns) but not underdetermined systems as a + unique solution is sought. + + Returns + ======= + + (xnum, xden) : (DomainMatrix, DomainElement) + The solution of the equation $Ax = b$ as a pair consisting of an + ``n x m`` matrix numerator ``xnum`` and a scalar denominator + ``xden``. + + The solution $x$ is given by ``x = xnum / xden``. The division free + invariant is ``A * xnum == xden * b``. If $A$ is square then the + denominator ``xden`` will be a divisor of the determinant $det(A)$. + + Raises + ====== + + DMNonInvertibleMatrixError + If the system $Ax = b$ does not have a unique solution. + + See Also + ======== + + solve_den_charpoly + solve_den_rref + inv_den + """ + m, n = self.shape + bm, bn = b.shape + + if m != bm: + raise DMShapeError("Matrix equation shape mismatch.") + + if method is None: + method = 'rref' + elif method == 'charpoly' and m != n: + raise DMNonSquareMatrixError("method='charpoly' requires a square matrix.") + + if method == 'charpoly': + xnum, xden = self.solve_den_charpoly(b) + elif method == 'rref': + xnum, xden = self.solve_den_rref(b) + else: + raise DMBadInputError("method should be 'rref' or 'charpoly'") + + return xnum, xden + + def solve_den_rref(self, b): + """ + Solve matrix equation $Ax = b$ using fraction-free RREF + + Solves the matrix equation $Ax = b$ for $x$ and returns the solution + as a numerator/denominator pair. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], ZZ) + >>> b = DM([[ZZ(5)], [ZZ(6)]], ZZ) + >>> xnum, xden = A.solve_den_rref(b) + >>> xden + -2 + >>> xnum + DomainMatrix([[8], [-9]], (2, 1), ZZ) + >>> A * xnum == xden * b + True + + See Also + ======== + + solve_den + solve_den_charpoly + """ + A = self + m, n = A.shape + bm, bn = b.shape + + if m != bm: + raise DMShapeError("Matrix equation shape mismatch.") + + if m < n: + raise DMShapeError("Underdetermined matrix equation.") + + Aaug = A.hstack(b) + Aaug_rref, denom, pivots = Aaug.rref_den() + + # XXX: We check here if there are pivots after the last column. If + # there were than it possibly means that rref_den performed some + # unnecessary elimination. It would be better if rref methods had a + # parameter indicating how many columns should be used for elimination. + if len(pivots) != n or pivots and pivots[-1] >= n: + raise DMNonInvertibleMatrixError("Non-unique solution.") + + xnum = Aaug_rref[:n, n:] + xden = denom + + return xnum, xden + + def solve_den_charpoly(self, b, cp=None, check=True): + """ + Solve matrix equation $Ax = b$ using the characteristic polynomial. + + This method solves the square matrix equation $Ax = b$ for $x$ using + the characteristic polynomial without any division or fractions in the + ground domain. + + Examples + ======== + + Solve a matrix equation over the integers: + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DM + >>> A = DM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], ZZ) + >>> b = DM([[ZZ(5)], [ZZ(6)]], ZZ) + >>> xnum, detA = A.solve_den_charpoly(b) + >>> detA + -2 + >>> xnum + DomainMatrix([[8], [-9]], (2, 1), ZZ) + >>> A * xnum == detA * b + True + + Parameters + ========== + + self : DomainMatrix + The ``n x n`` matrix `A` in the equation `Ax = b`. Must be square + and invertible. + b : DomainMatrix + The ``n x m`` matrix `b` for the rhs. + cp : list, optional + The characteristic polynomial of the matrix `A` if known. If not + given, it will be computed using :meth:`charpoly`. + check : bool, optional + If ``True`` (the default) check that the determinant is not zero + and raise an error if it is. If ``False`` then if the determinant + is zero the return value will be equal to ``(A.adjugate()*b, 0)``. + + Returns + ======= + + (xnum, detA) : (DomainMatrix, DomainElement) + The solution of the equation `Ax = b` as a matrix numerator and + scalar denominator pair. The denominator is equal to the + determinant of `A` and the numerator is ``adj(A)*b``. + + The solution $x$ is given by ``x = xnum / detA``. The division free + invariant is ``A * xnum == detA * b``. + + If ``b`` is the identity matrix, then ``xnum`` is the adjugate matrix + and we have ``A * adj(A) == detA * I``. + + See Also + ======== + + solve_den + Main frontend for solving matrix equations with denominator. + solve_den_rref + Solve matrix equations using fraction-free RREF. + inv_den + Invert a matrix using the characteristic polynomial. + """ + A, b = self.unify(b) + m, n = self.shape + mb, nb = b.shape + + if m != n: + raise DMNonSquareMatrixError("Matrix must be square") + + if mb != m: + raise DMShapeError("Matrix and vector must have the same number of rows") + + f, detA = self.adj_poly_det(cp=cp) + + if check and not detA: + raise DMNonInvertibleMatrixError("Matrix is not invertible") + + # Compute adj(A)*b = det(A)*inv(A)*b using Horner's method without + # constructing inv(A) explicitly. + adjA_b = self.eval_poly_mul(f, b) + + return (adjA_b, detA) + + def adj_poly_det(self, cp=None): + """ + Return the polynomial $p$ such that $p(A) = adj(A)$ and also the + determinant of $A$. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], QQ) + >>> p, detA = A.adj_poly_det() + >>> p + [-1, 5] + >>> p_A = A.eval_poly(p) + >>> p_A + DomainMatrix([[4, -2], [-3, 1]], (2, 2), QQ) + >>> p[0]*A**1 + p[1]*A**0 == p_A + True + >>> p_A == A.adjugate() + True + >>> A * A.adjugate() == detA * A.eye(A.shape, A.domain).to_dense() + True + + See Also + ======== + + adjugate + eval_poly + adj_det + """ + + # Cayley-Hamilton says that a matrix satisfies its own minimal + # polynomial + # + # p[0]*A^n + p[1]*A^(n-1) + ... + p[n]*I = 0 + # + # with p[0]=1 and p[n]=(-1)^n*det(A) or + # + # det(A)*I = -(-1)^n*(p[0]*A^(n-1) + p[1]*A^(n-2) + ... + p[n-1]*A). + # + # Define a new polynomial f with f[i] = -(-1)^n*p[i] for i=0..n-1. Then + # + # det(A)*I = f[0]*A^n + f[1]*A^(n-1) + ... + f[n-1]*A. + # + # Multiplying on the right by inv(A) gives + # + # det(A)*inv(A) = f[0]*A^(n-1) + f[1]*A^(n-2) + ... + f[n-1]. + # + # So adj(A) = det(A)*inv(A) = f(A) + + A = self + m, n = self.shape + + if m != n: + raise DMNonSquareMatrixError("Matrix must be square") + + if cp is None: + cp = A.charpoly() + + if len(cp) % 2: + # n is even + detA = cp[-1] + f = [-cpi for cpi in cp[:-1]] + else: + # n is odd + detA = -cp[-1] + f = cp[:-1] + + return f, detA + + def eval_poly(self, p): + """ + Evaluate polynomial function of a matrix $p(A)$. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], QQ) + >>> p = [QQ(1), QQ(2), QQ(3)] + >>> p_A = A.eval_poly(p) + >>> p_A + DomainMatrix([[12, 14], [21, 33]], (2, 2), QQ) + >>> p_A == p[0]*A**2 + p[1]*A + p[2]*A**0 + True + + See Also + ======== + + eval_poly_mul + """ + A = self + m, n = A.shape + + if m != n: + raise DMNonSquareMatrixError("Matrix must be square") + + if not p: + return self.zeros(self.shape, self.domain) + elif len(p) == 1: + return p[0] * self.eye(self.shape, self.domain) + + # Evaluate p(A) using Horner's method: + # XXX: Use Paterson-Stockmeyer method? + I = A.eye(A.shape, A.domain) + p_A = p[0] * I + for pi in p[1:]: + p_A = A*p_A + pi*I + + return p_A + + def eval_poly_mul(self, p, B): + r""" + Evaluate polynomial matrix product $p(A) \times B$. + + Evaluate the polynomial matrix product $p(A) \times B$ using Horner's + method without creating the matrix $p(A)$ explicitly. If $B$ is a + column matrix then this method will only use matrix-vector multiplies + and no matrix-matrix multiplies are needed. + + If $B$ is square or wide or if $A$ can be represented in a simpler + domain than $B$ then it might be faster to evaluate $p(A)$ explicitly + (see :func:`eval_poly`) and then multiply with $B$. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DM + >>> A = DM([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], QQ) + >>> b = DM([[QQ(5)], [QQ(6)]], QQ) + >>> p = [QQ(1), QQ(2), QQ(3)] + >>> p_A_b = A.eval_poly_mul(p, b) + >>> p_A_b + DomainMatrix([[144], [303]], (2, 1), QQ) + >>> p_A_b == p[0]*A**2*b + p[1]*A*b + p[2]*b + True + >>> A.eval_poly_mul(p, b) == A.eval_poly(p)*b + True + + See Also + ======== + + eval_poly + solve_den_charpoly + """ + A = self + m, n = A.shape + mb, nb = B.shape + + if m != n: + raise DMNonSquareMatrixError("Matrix must be square") + + if mb != n: + raise DMShapeError("Matrices are not aligned") + + if A.domain != B.domain: + raise DMDomainError("Matrices must have the same domain") + + # Given a polynomial p(x) = p[0]*x^n + p[1]*x^(n-1) + ... + p[n-1] + # and matrices A and B we want to find + # + # p(A)*B = p[0]*A^n*B + p[1]*A^(n-1)*B + ... + p[n-1]*B + # + # Factoring out A term by term we get + # + # p(A)*B = A*(...A*(A*(A*(p[0]*B) + p[1]*B) + p[2]*B) + ...) + p[n-1]*B + # + # where each pair of brackets represents one iteration of the loop + # below starting from the innermost p[0]*B. If B is a column matrix + # then products like A*(...) are matrix-vector multiplies and products + # like p[i]*B are scalar-vector multiplies so there are no + # matrix-matrix multiplies. + + if not p: + return B.zeros(B.shape, B.domain, fmt=B.rep.fmt) + + p_A_B = p[0]*B + + for p_i in p[1:]: + p_A_B = A*p_A_B + p_i*B + + return p_A_B + + def lu(self): + r""" + Returns Lower and Upper decomposition of the DomainMatrix + + Returns + ======= + + (L, U, exchange) + L, U are Lower and Upper decomposition of the DomainMatrix, + exchange is the list of indices of rows exchanged in the + decomposition. + + Raises + ====== + + ValueError + If the domain of DomainMatrix not a Field + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(1), QQ(-1)], + ... [QQ(2), QQ(-2)]], (2, 2), QQ) + >>> L, U, exchange = A.lu() + >>> L + DomainMatrix([[1, 0], [2, 1]], (2, 2), QQ) + >>> U + DomainMatrix([[1, -1], [0, 0]], (2, 2), QQ) + >>> exchange + [] + + See Also + ======== + + lu_solve + + """ + if not self.domain.is_Field: + raise DMNotAField('Not a field') + L, U, swaps = self.rep.lu() + return self.from_rep(L), self.from_rep(U), swaps + + def qr(self): + r""" + QR decomposition of the DomainMatrix. + + Explanation + =========== + + The QR decomposition expresses a matrix as the product of an orthogonal + matrix (Q) and an upper triangular matrix (R). In this implementation, + Q is not orthonormal: its columns are orthogonal but not normalized to + unit vectors. This avoids unnecessary divisions and is particularly + suited for exact arithmetic domains. + + Note + ==== + + This implementation is valid only for matrices over real domains. For + matrices over complex domains, a proper QR decomposition would require + handling conjugation to ensure orthogonality. + + Returns + ======= + + (Q, R) + Q is the orthogonal matrix, and R is the upper triangular matrix + resulting from the QR decomposition of the DomainMatrix. + + Raises + ====== + + DMDomainError + If the domain of the DomainMatrix is not a field (e.g., QQ). + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[1, 2], [3, 4], [5, 6]], (3, 2), QQ) + >>> Q, R = A.qr() + >>> Q + DomainMatrix([[1, 26/35], [3, 8/35], [5, -2/7]], (3, 2), QQ) + >>> R + DomainMatrix([[1, 44/35], [0, 1]], (2, 2), QQ) + >>> Q * R == A + True + >>> (Q.transpose() * Q).is_diagonal + True + >>> R.is_upper + True + + See Also + ======== + + lu + + """ + ddm_q, ddm_r = self.rep.qr() + Q = self.from_rep(ddm_q) + R = self.from_rep(ddm_r) + return Q, R + + def lu_solve(self, rhs): + r""" + Solver for DomainMatrix x in the A*x = B + + Parameters + ========== + + rhs : DomainMatrix B + + Returns + ======= + + DomainMatrix + x in A*x = B + + Raises + ====== + + DMShapeError + If the DomainMatrix A and rhs have different number of rows + + ValueError + If the domain of DomainMatrix A not a Field + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [QQ(1), QQ(2)], + ... [QQ(3), QQ(4)]], (2, 2), QQ) + >>> B = DomainMatrix([ + ... [QQ(1), QQ(1)], + ... [QQ(0), QQ(1)]], (2, 2), QQ) + + >>> A.lu_solve(B) + DomainMatrix([[-2, -1], [3/2, 1]], (2, 2), QQ) + + See Also + ======== + + lu + + """ + if self.shape[0] != rhs.shape[0]: + raise DMShapeError("Shape") + if not self.domain.is_Field: + raise DMNotAField('Not a field') + sol = self.rep.lu_solve(rhs.rep) + return self.from_rep(sol) + + def fflu(self): + """ + Fraction-free LU decomposition of DomainMatrix. + + Explanation + =========== + + This method computes the PLDU decomposition + using Gauss-Bareiss elimination in a fraction-free manner, + it ensures that all intermediate results remain in + the domain of the input matrix. Unlike standard + LU decomposition, which introduces division, this approach + avoids fractions, making it particularly suitable + for exact arithmetic over integers or polynomials. + + This method satisfies the invariant: + + P * A = L * inv(D) * U + + Returns + ======= + + (P, L, D, U) + - P (Permutation matrix) + - L (Lower triangular matrix) + - D (Diagonal matrix) + - U (Upper triangular matrix) + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ) + >>> P, L, D, U = A.fflu() + >>> P + DomainMatrix([[1, 0], [0, 1]], (2, 2), ZZ) + >>> L + DomainMatrix([[1, 0], [3, -2]], (2, 2), ZZ) + >>> D + DomainMatrix([[1, 0], [0, -2]], (2, 2), ZZ) + >>> U + DomainMatrix([[1, 2], [0, -2]], (2, 2), ZZ) + >>> L.is_lower and U.is_upper and D.is_diagonal + True + >>> L * D.to_field().inv() * U == P * A.to_field() + True + >>> I, d = D.inv_den() + >>> L * I * U == d * P * A + True + + See Also + ======== + + sympy.polys.matrices.ddm.DDM.fflu + + References + ========== + + .. [1] Nakos, G. C., Turner, P. R., & Williams, R. M. (1997). Fraction-free + algorithms for linear and polynomial equations. ACM SIGSAM Bulletin, + 31(3), 11-19. https://doi.org/10.1145/271130.271133 + .. [2] Middeke, J.; Jeffrey, D.J.; Koutschan, C. (2020), "Common Factors + in Fraction-Free Matrix Decompositions", Mathematics in Computer Science, + 15 (4): 589–608, arXiv:2005.12380, doi:10.1007/s11786-020-00495-9 + .. [3] https://en.wikipedia.org/wiki/Bareiss_algorithm + """ + from_rep = self.from_rep + P, L, D, U = self.rep.fflu() + return from_rep(P), from_rep(L), from_rep(D), from_rep(U) + + def _solve(A, b): + # XXX: Not sure about this method or its signature. It is just created + # because it is needed by the holonomic module. + if A.shape[0] != b.shape[0]: + raise DMShapeError("Shape") + if A.domain != b.domain or not A.domain.is_Field: + raise DMNotAField('Not a field') + Aaug = A.hstack(b) + Arref, pivots = Aaug.rref() + particular = Arref.from_rep(Arref.rep.particular()) + nullspace_rep, nonpivots = Arref[:,:-1].rep.nullspace() + nullspace = Arref.from_rep(nullspace_rep) + return particular, nullspace + + def charpoly(self): + r""" + Characteristic polynomial of a square matrix. + + Computes the characteristic polynomial in a fully expanded form using + division free arithmetic. If a factorization of the characteristic + polynomial is needed then it is more efficient to call + :meth:`charpoly_factor_list` than calling :meth:`charpoly` and then + factorizing the result. + + Returns + ======= + + list: list of DomainElement + coefficients of the characteristic polynomial + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + >>> A.charpoly() + [1, -5, -2] + + See Also + ======== + + charpoly_factor_list + Compute the factorisation of the characteristic polynomial. + charpoly_factor_blocks + A partial factorisation of the characteristic polynomial that can + be computed more efficiently than either the full factorisation or + the fully expanded polynomial. + """ + M = self + K = M.domain + + factors = M.charpoly_factor_blocks() + + cp = [K.one] + + for f, mult in factors: + for _ in range(mult): + cp = dup_mul(cp, f, K) + + return cp + + def charpoly_factor_list(self): + """ + Full factorization of the characteristic polynomial. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[6, -1, 0, 0], + ... [9, 12, 0, 0], + ... [0, 0, 1, 2], + ... [0, 0, 5, 6]], ZZ) + + Compute the factorization of the characteristic polynomial: + + >>> M.charpoly_factor_list() + [([1, -9], 2), ([1, -7, -4], 1)] + + Use :meth:`charpoly` to get the unfactorized characteristic polynomial: + + >>> M.charpoly() + [1, -25, 203, -495, -324] + + The same calculations with ``Matrix``: + + >>> M.to_Matrix().charpoly().as_expr() + lambda**4 - 25*lambda**3 + 203*lambda**2 - 495*lambda - 324 + >>> M.to_Matrix().charpoly().as_expr().factor() + (lambda - 9)**2*(lambda**2 - 7*lambda - 4) + + Returns + ======= + + list: list of pairs (factor, multiplicity) + A full factorization of the characteristic polynomial. + + See Also + ======== + + charpoly + Expanded form of the characteristic polynomial. + charpoly_factor_blocks + A partial factorisation of the characteristic polynomial that can + be computed more efficiently. + """ + M = self + K = M.domain + + # It is more efficient to start from the partial factorization provided + # for free by M.charpoly_factor_blocks than the expanded M.charpoly. + factors = M.charpoly_factor_blocks() + + factors_irreducible = [] + + for factor_i, mult_i in factors: + + _, factors_list = dup_factor_list(factor_i, K) + + for factor_j, mult_j in factors_list: + factors_irreducible.append((factor_j, mult_i * mult_j)) + + return _collect_factors(factors_irreducible) + + def charpoly_factor_blocks(self): + """ + Partial factorisation of the characteristic polynomial. + + This factorisation arises from a block structure of the matrix (if any) + and so the factors are not guaranteed to be irreducible. The + :meth:`charpoly_factor_blocks` method is the most efficient way to get + a representation of the characteristic polynomial but the result is + neither fully expanded nor fully factored. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import ZZ + >>> M = DM([[6, -1, 0, 0], + ... [9, 12, 0, 0], + ... [0, 0, 1, 2], + ... [0, 0, 5, 6]], ZZ) + + This computes a partial factorization using only the block structure of + the matrix to reveal factors: + + >>> M.charpoly_factor_blocks() + [([1, -18, 81], 1), ([1, -7, -4], 1)] + + These factors correspond to the two diagonal blocks in the matrix: + + >>> DM([[6, -1], [9, 12]], ZZ).charpoly() + [1, -18, 81] + >>> DM([[1, 2], [5, 6]], ZZ).charpoly() + [1, -7, -4] + + Use :meth:`charpoly_factor_list` to get a complete factorization into + irreducibles: + + >>> M.charpoly_factor_list() + [([1, -9], 2), ([1, -7, -4], 1)] + + Use :meth:`charpoly` to get the expanded characteristic polynomial: + + >>> M.charpoly() + [1, -25, 203, -495, -324] + + Returns + ======= + + list: list of pairs (factor, multiplicity) + A partial factorization of the characteristic polynomial. + + See Also + ======== + + charpoly + Compute the fully expanded characteristic polynomial. + charpoly_factor_list + Compute a full factorization of the characteristic polynomial. + """ + M = self + + if not M.is_square: + raise DMNonSquareMatrixError("not square") + + # scc returns indices that permute the matrix into block triangular + # form and can extract the diagonal blocks. M.charpoly() is equal to + # the product of the diagonal block charpolys. + components = M.scc() + + block_factors = [] + + for indices in components: + block = M.extract(indices, indices) + block_factors.append((block.charpoly_base(), 1)) + + return _collect_factors(block_factors) + + def charpoly_base(self): + """ + Base case for :meth:`charpoly_factor_blocks` after block decomposition. + + This method is used internally by :meth:`charpoly_factor_blocks` as the + base case for computing the characteristic polynomial of a block. It is + more efficient to call :meth:`charpoly_factor_blocks`, :meth:`charpoly` + or :meth:`charpoly_factor_list` rather than call this method directly. + + This will use either the dense or the sparse implementation depending + on the sparsity of the matrix and will clear denominators if possible + before calling :meth:`charpoly_berk` to compute the characteristic + polynomial using the Berkowitz algorithm. + + See Also + ======== + + charpoly + charpoly_factor_list + charpoly_factor_blocks + charpoly_berk + """ + M = self + K = M.domain + + # It seems that the sparse implementation is always faster for random + # matrices with fewer than 50% non-zero entries. This does not seem to + # depend on domain, size, bit count etc. + density = self.nnz() / self.shape[0]**2 + if density < 0.5: + M = M.to_sparse() + else: + M = M.to_dense() + + # Clearing denominators is always more efficient if it can be done. + # Doing it here after block decomposition is good because each block + # might have a smaller denominator. However it might be better for + # charpoly and charpoly_factor_list to restore the denominators only at + # the very end so that they can call e.g. dup_factor_list before + # restoring the denominators. The methods would need to be changed to + # return (poly, denom) pairs to make that work though. + clear_denoms = K.is_Field and K.has_assoc_Ring + + if clear_denoms: + clear_denoms = True + d, M = M.clear_denoms(convert=True) + d = d.element + K_f = K + K_r = M.domain + + # Berkowitz algorithm over K_r. + cp = M.charpoly_berk() + + if clear_denoms: + # Restore the denominator in the charpoly over K_f. + # + # If M = N/d then p_M(x) = p_N(x*d)/d^n. + cp = dup_convert(cp, K_r, K_f) + p = [K_f.one, K_f.zero] + q = [K_f.one/d] + cp = dup_transform(cp, p, q, K_f) + + return cp + + def charpoly_berk(self): + """Compute the characteristic polynomial using the Berkowitz algorithm. + + This method directly calls the underlying implementation of the + Berkowitz algorithm (:meth:`sympy.polys.matrices.dense.ddm_berk` or + :meth:`sympy.polys.matrices.sdm.sdm_berk`). + + This is used by :meth:`charpoly` and other methods as the base case for + for computing the characteristic polynomial. However those methods will + apply other optimizations such as block decomposition, clearing + denominators and converting between dense and sparse representations + before calling this method. It is more efficient to call those methods + instead of this one but this method is provided for direct access to + the Berkowitz algorithm. + + Examples + ======== + + >>> from sympy.polys.matrices import DM + >>> from sympy import QQ + >>> M = DM([[6, -1, 0, 0], + ... [9, 12, 0, 0], + ... [0, 0, 1, 2], + ... [0, 0, 5, 6]], QQ) + >>> M.charpoly_berk() + [1, -25, 203, -495, -324] + + See Also + ======== + + charpoly + charpoly_base + charpoly_factor_list + charpoly_factor_blocks + sympy.polys.matrices.dense.ddm_berk + sympy.polys.matrices.sdm.sdm_berk + """ + return self.rep.charpoly() + + @classmethod + def eye(cls, shape, domain): + r""" + Return identity matrix of size n or shape (m, n). + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> DomainMatrix.eye(3, QQ) + DomainMatrix({0: {0: 1}, 1: {1: 1}, 2: {2: 1}}, (3, 3), QQ) + + """ + if isinstance(shape, int): + shape = (shape, shape) + return cls.from_rep(SDM.eye(shape, domain)) + + @classmethod + def diag(cls, diagonal, domain, shape=None): + r""" + Return diagonal matrix with entries from ``diagonal``. + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import ZZ + >>> DomainMatrix.diag([ZZ(5), ZZ(6)], ZZ) + DomainMatrix({0: {0: 5}, 1: {1: 6}}, (2, 2), ZZ) + + """ + if shape is None: + N = len(diagonal) + shape = (N, N) + return cls.from_rep(SDM.diag(diagonal, domain, shape)) + + @classmethod + def zeros(cls, shape, domain, *, fmt='sparse'): + """Returns a zero DomainMatrix of size shape, belonging to the specified domain + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> DomainMatrix.zeros((2, 3), QQ) + DomainMatrix({}, (2, 3), QQ) + + """ + return cls.from_rep(SDM.zeros(shape, domain)) + + @classmethod + def ones(cls, shape, domain): + """Returns a DomainMatrix of 1s, of size shape, belonging to the specified domain + + Examples + ======== + + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy import QQ + >>> DomainMatrix.ones((2,3), QQ) + DomainMatrix([[1, 1, 1], [1, 1, 1]], (2, 3), QQ) + + """ + return cls.from_rep(DDM.ones(shape, domain).to_dfm_or_ddm()) + + def __eq__(A, B): + r""" + Checks for two DomainMatrix matrices to be equal or not + + Parameters + ========== + + A, B: DomainMatrix + to check equality + + Returns + ======= + + Boolean + True for equal, else False + + Raises + ====== + + NotImplementedError + If B is not a DomainMatrix + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> A = DomainMatrix([ + ... [ZZ(1), ZZ(2)], + ... [ZZ(3), ZZ(4)]], (2, 2), ZZ) + >>> B = DomainMatrix([ + ... [ZZ(1), ZZ(1)], + ... [ZZ(0), ZZ(1)]], (2, 2), ZZ) + >>> A.__eq__(A) + True + >>> A.__eq__(B) + False + + """ + if not isinstance(A, type(B)): + return NotImplemented + return A.domain == B.domain and A.rep == B.rep + + def unify_eq(A, B): + if A.shape != B.shape: + return False + if A.domain != B.domain: + A, B = A.unify(B) + return A == B + + def lll(A, delta=QQ(3, 4)): + """ + Performs the Lenstra–Lenstra–Lovász (LLL) basis reduction algorithm. + See [1]_ and [2]_. + + Parameters + ========== + + delta : QQ, optional + The Lovász parameter. Must be in the interval (0.25, 1), with larger + values producing a more reduced basis. The default is 0.75 for + historical reasons. + + Returns + ======= + + The reduced basis as a DomainMatrix over ZZ. + + Throws + ====== + + DMValueError: if delta is not in the range (0.25, 1) + DMShapeError: if the matrix is not of shape (m, n) with m <= n + DMDomainError: if the matrix domain is not ZZ + DMRankError: if the matrix contains linearly dependent rows + + Examples + ======== + + >>> from sympy.polys.domains import ZZ, QQ + >>> from sympy.polys.matrices import DM + >>> x = DM([[1, 0, 0, 0, -20160], + ... [0, 1, 0, 0, 33768], + ... [0, 0, 1, 0, 39578], + ... [0, 0, 0, 1, 47757]], ZZ) + >>> y = DM([[10, -3, -2, 8, -4], + ... [3, -9, 8, 1, -11], + ... [-3, 13, -9, -3, -9], + ... [-12, -7, -11, 9, -1]], ZZ) + >>> assert x.lll(delta=QQ(5, 6)) == y + + Notes + ===== + + The implementation is derived from the Maple code given in Figures 4.3 + and 4.4 of [3]_ (pp.68-69). It uses the efficient method of only calculating + state updates as they are required. + + See also + ======== + + lll_transform + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lenstra%E2%80%93Lenstra%E2%80%93Lov%C3%A1sz_lattice_basis_reduction_algorithm + .. [2] https://web.archive.org/web/20221029115428/https://web.cs.elte.hu/~lovasz/scans/lll.pdf + .. [3] Murray R. Bremner, "Lattice Basis Reduction: An Introduction to the LLL Algorithm and Its Applications" + + """ + return DomainMatrix.from_rep(A.rep.lll(delta=delta)) + + def lll_transform(A, delta=QQ(3, 4)): + """ + Performs the Lenstra–Lenstra–Lovász (LLL) basis reduction algorithm + and returns the reduced basis and transformation matrix. + + Explanation + =========== + + Parameters, algorithm and basis are the same as for :meth:`lll` except that + the return value is a tuple `(B, T)` with `B` the reduced basis and + `T` a transformation matrix. The original basis `A` is transformed to + `B` with `T*A == B`. If only `B` is needed then :meth:`lll` should be + used as it is a little faster. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ, QQ + >>> from sympy.polys.matrices import DM + >>> X = DM([[1, 0, 0, 0, -20160], + ... [0, 1, 0, 0, 33768], + ... [0, 0, 1, 0, 39578], + ... [0, 0, 0, 1, 47757]], ZZ) + >>> B, T = X.lll_transform(delta=QQ(5, 6)) + >>> T * X == B + True + + See also + ======== + + lll + + """ + reduced, transform = A.rep.lll_transform(delta=delta) + return DomainMatrix.from_rep(reduced), DomainMatrix.from_rep(transform) + + +def _collect_factors(factors_list): + """ + Collect repeating factors and sort. + + >>> from sympy.polys.matrices.domainmatrix import _collect_factors + >>> _collect_factors([([1, 2], 2), ([1, 4], 3), ([1, 2], 5)]) + [([1, 4], 3), ([1, 2], 7)] + """ + factors = Counter() + for factor, exponent in factors_list: + factors[tuple(factor)] += exponent + + factors_list = [(list(f), e) for f, e in factors.items()] + + return _sort_factors(factors_list) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainscalar.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainscalar.py new file mode 100644 index 0000000000000000000000000000000000000000..df439a60a0ea0df5f6fac988c06da2a06a4fbac2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/domainscalar.py @@ -0,0 +1,122 @@ +""" + +Module for the DomainScalar class. + +A DomainScalar represents an element which is in a particular +Domain. The idea is that the DomainScalar class provides the +convenience routines for unifying elements with different domains. + +It assists in Scalar Multiplication and getitem for DomainMatrix. + +""" +from ..constructor import construct_domain + +from sympy.polys.domains import Domain, ZZ + + +class DomainScalar: + r""" + docstring + """ + + def __new__(cls, element, domain): + if not isinstance(domain, Domain): + raise TypeError("domain should be of type Domain") + if not domain.of_type(element): + raise TypeError("element %s should be in domain %s" % (element, domain)) + return cls.new(element, domain) + + @classmethod + def new(cls, element, domain): + obj = super().__new__(cls) + obj.element = element + obj.domain = domain + return obj + + def __repr__(self): + return repr(self.element) + + @classmethod + def from_sympy(cls, expr): + [domain, [element]] = construct_domain([expr]) + return cls.new(element, domain) + + def to_sympy(self): + return self.domain.to_sympy(self.element) + + def to_domain(self, domain): + element = domain.convert_from(self.element, self.domain) + return self.new(element, domain) + + def convert_to(self, domain): + return self.to_domain(domain) + + def unify(self, other): + domain = self.domain.unify(other.domain) + return self.to_domain(domain), other.to_domain(domain) + + def __bool__(self): + return bool(self.element) + + def __add__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + self, other = self.unify(other) + return self.new(self.element + other.element, self.domain) + + def __sub__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + self, other = self.unify(other) + return self.new(self.element - other.element, self.domain) + + def __mul__(self, other): + if not isinstance(other, DomainScalar): + if isinstance(other, int): + other = DomainScalar(ZZ(other), ZZ) + else: + return NotImplemented + + self, other = self.unify(other) + return self.new(self.element * other.element, self.domain) + + def __floordiv__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + self, other = self.unify(other) + return self.new(self.domain.quo(self.element, other.element), self.domain) + + def __mod__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + self, other = self.unify(other) + return self.new(self.domain.rem(self.element, other.element), self.domain) + + def __divmod__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + self, other = self.unify(other) + q, r = self.domain.div(self.element, other.element) + return (self.new(q, self.domain), self.new(r, self.domain)) + + def __pow__(self, n): + if not isinstance(n, int): + return NotImplemented + return self.new(self.element**n, self.domain) + + def __pos__(self): + return self.new(+self.element, self.domain) + + def __neg__(self): + return self.new(-self.element, self.domain) + + def __eq__(self, other): + if not isinstance(other, DomainScalar): + return NotImplemented + return self.element == other.element and self.domain == other.domain + + def is_zero(self): + return self.element == self.domain.zero + + def is_one(self): + return self.element == self.domain.one diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/eigen.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/eigen.py new file mode 100644 index 0000000000000000000000000000000000000000..17d673c6ea09002e1cfd5357f301c447a7af4341 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/eigen.py @@ -0,0 +1,90 @@ +""" + +Routines for computing eigenvectors with DomainMatrix. + +""" +from sympy.core.symbol import Dummy + +from ..agca.extensions import FiniteExtension +from ..factortools import dup_factor_list +from ..polyroots import roots +from ..polytools import Poly +from ..rootoftools import CRootOf + +from .domainmatrix import DomainMatrix + + +def dom_eigenvects(A, l=Dummy('lambda')): + charpoly = A.charpoly() + rows, cols = A.shape + domain = A.domain + _, factors = dup_factor_list(charpoly, domain) + + rational_eigenvects = [] + algebraic_eigenvects = [] + for base, exp in factors: + if len(base) == 2: + field = domain + eigenval = -base[1] / base[0] + + EE_items = [ + [eigenval if i == j else field.zero for j in range(cols)] + for i in range(rows)] + EE = DomainMatrix(EE_items, (rows, cols), field) + + basis = (A - EE).nullspace(divide_last=True) + rational_eigenvects.append((field, eigenval, exp, basis)) + else: + minpoly = Poly.from_list(base, l, domain=domain) + field = FiniteExtension(minpoly) + eigenval = field(l) + + AA_items = [ + [Poly.from_list([item], l, domain=domain).rep for item in row] + for row in A.rep.to_ddm()] + AA_items = [[field(item) for item in row] for row in AA_items] + AA = DomainMatrix(AA_items, (rows, cols), field) + EE_items = [ + [eigenval if i == j else field.zero for j in range(cols)] + for i in range(rows)] + EE = DomainMatrix(EE_items, (rows, cols), field) + + basis = (AA - EE).nullspace(divide_last=True) + algebraic_eigenvects.append((field, minpoly, exp, basis)) + + return rational_eigenvects, algebraic_eigenvects + + +def dom_eigenvects_to_sympy( + rational_eigenvects, algebraic_eigenvects, + Matrix, **kwargs +): + result = [] + + for field, eigenvalue, multiplicity, eigenvects in rational_eigenvects: + eigenvects = eigenvects.rep.to_ddm() + eigenvalue = field.to_sympy(eigenvalue) + new_eigenvects = [ + Matrix([field.to_sympy(x) for x in vect]) + for vect in eigenvects] + result.append((eigenvalue, multiplicity, new_eigenvects)) + + for field, minpoly, multiplicity, eigenvects in algebraic_eigenvects: + eigenvects = eigenvects.rep.to_ddm() + l = minpoly.gens[0] + + eigenvects = [[field.to_sympy(x) for x in vect] for vect in eigenvects] + + degree = minpoly.degree() + minpoly = minpoly.as_expr() + eigenvals = roots(minpoly, l, **kwargs) + if len(eigenvals) != degree: + eigenvals = [CRootOf(minpoly, l, idx) for idx in range(degree)] + + for eigenvalue in eigenvals: + new_eigenvects = [ + Matrix([x.subs(l, eigenvalue) for x in vect]) + for vect in eigenvects] + result.append((eigenvalue, multiplicity, new_eigenvects)) + + return result diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/exceptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/exceptions.py new file mode 100644 index 0000000000000000000000000000000000000000..b1e5a4195c66aceed2d5ac1994381d3dec6a64ba --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/exceptions.py @@ -0,0 +1,67 @@ +""" + +Module to define exceptions to be used in sympy.polys.matrices modules and +classes. + +Ideally all exceptions raised in these modules would be defined and documented +here and not e.g. imported from matrices. Also ideally generic exceptions like +ValueError/TypeError would not be raised anywhere. + +""" + + +class DMError(Exception): + """Base class for errors raised by DomainMatrix""" + pass + + +class DMBadInputError(DMError): + """list of lists is inconsistent with shape""" + pass + + +class DMDomainError(DMError): + """domains do not match""" + pass + + +class DMNotAField(DMDomainError): + """domain is not a field""" + pass + + +class DMFormatError(DMError): + """mixed dense/sparse not supported""" + pass + + +class DMNonInvertibleMatrixError(DMError): + """The matrix in not invertible""" + pass + + +class DMRankError(DMError): + """matrix does not have expected rank""" + pass + + +class DMShapeError(DMError): + """shapes are inconsistent""" + pass + + +class DMNonSquareMatrixError(DMShapeError): + """The matrix is not square""" + pass + + +class DMValueError(DMError): + """The value passed is invalid""" + pass + + +__all__ = [ + 'DMError', 'DMBadInputError', 'DMDomainError', 'DMFormatError', + 'DMRankError', 'DMShapeError', 'DMNotAField', + 'DMNonInvertibleMatrixError', 'DMNonSquareMatrixError', 'DMValueError' +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/linsolve.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/linsolve.py new file mode 100644 index 0000000000000000000000000000000000000000..af74058d859b744cf8fe1059ddb7c775fece79c7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/linsolve.py @@ -0,0 +1,230 @@ +# +# sympy.polys.matrices.linsolve module +# +# This module defines the _linsolve function which is the internal workhorse +# used by linsolve. This computes the solution of a system of linear equations +# using the SDM sparse matrix implementation in sympy.polys.matrices.sdm. This +# is a replacement for solve_lin_sys in sympy.polys.solvers which is +# inefficient for large sparse systems due to the use of a PolyRing with many +# generators: +# +# https://github.com/sympy/sympy/issues/20857 +# +# The implementation of _linsolve here handles: +# +# - Extracting the coefficients from the Expr/Eq input equations. +# - Constructing a domain and converting the coefficients to +# that domain. +# - Using the SDM.rref, SDM.nullspace etc methods to generate the full +# solution working with arithmetic only in the domain of the coefficients. +# +# The routines here are particularly designed to be efficient for large sparse +# systems of linear equations although as well as dense systems. It is +# possible that for some small dense systems solve_lin_sys which uses the +# dense matrix implementation DDM will be more efficient. With smaller systems +# though the bulk of the time is spent just preprocessing the inputs and the +# relative time spent in rref is too small to be noticeable. +# + +from collections import defaultdict + +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.core.singleton import S + +from sympy.polys.constructor import construct_domain +from sympy.polys.solvers import PolyNonlinearError + +from .sdm import ( + SDM, + sdm_irref, + sdm_particular_from_rref, + sdm_nullspace_from_rref +) + +from sympy.utilities.misc import filldedent + + +def _linsolve(eqs, syms): + + """Solve a linear system of equations. + + Examples + ======== + + Solve a linear system with a unique solution: + + >>> from sympy import symbols, Eq + >>> from sympy.polys.matrices.linsolve import _linsolve + >>> x, y = symbols('x, y') + >>> eqs = [Eq(x + y, 1), Eq(x - y, 2)] + >>> _linsolve(eqs, [x, y]) + {x: 3/2, y: -1/2} + + In the case of underdetermined systems the solution will be expressed in + terms of the unknown symbols that are unconstrained: + + >>> _linsolve([Eq(x + y, 0)], [x, y]) + {x: -y, y: y} + + """ + # Number of unknowns (columns in the non-augmented matrix) + nsyms = len(syms) + + # Convert to sparse augmented matrix (len(eqs) x (nsyms+1)) + eqsdict, const = _linear_eq_to_dict(eqs, syms) + Aaug = sympy_dict_to_dm(eqsdict, const, syms) + K = Aaug.domain + + # sdm_irref has issues with float matrices. This uses the ddm_rref() + # function. When sdm_rref() can handle float matrices reasonably this + # should be removed... + if K.is_RealField or K.is_ComplexField: + Aaug = Aaug.to_ddm().rref()[0].to_sdm() + + # Compute reduced-row echelon form (RREF) + Arref, pivots, nzcols = sdm_irref(Aaug) + + # No solution: + if pivots and pivots[-1] == nsyms: + return None + + # Particular solution for non-homogeneous system: + P = sdm_particular_from_rref(Arref, nsyms+1, pivots) + + # Nullspace - general solution to homogeneous system + # Note: using nsyms not nsyms+1 to ignore last column + V, nonpivots = sdm_nullspace_from_rref(Arref, K.one, nsyms, pivots, nzcols) + + # Collect together terms from particular and nullspace: + sol = defaultdict(list) + for i, v in P.items(): + sol[syms[i]].append(K.to_sympy(v)) + for npi, Vi in zip(nonpivots, V): + sym = syms[npi] + for i, v in Vi.items(): + sol[syms[i]].append(sym * K.to_sympy(v)) + + # Use a single call to Add for each term: + sol = {s: Add(*terms) for s, terms in sol.items()} + + # Fill in the zeros: + zero = S.Zero + for s in set(syms) - set(sol): + sol[s] = zero + + # All done! + return sol + + +def sympy_dict_to_dm(eqs_coeffs, eqs_rhs, syms): + """Convert a system of dict equations to a sparse augmented matrix""" + elems = set(eqs_rhs).union(*(e.values() for e in eqs_coeffs)) + K, elems_K = construct_domain(elems, field=True, extension=True) + elem_map = dict(zip(elems, elems_K)) + neqs = len(eqs_coeffs) + nsyms = len(syms) + sym2index = dict(zip(syms, range(nsyms))) + eqsdict = [] + for eq, rhs in zip(eqs_coeffs, eqs_rhs): + eqdict = {sym2index[s]: elem_map[c] for s, c in eq.items()} + if rhs: + eqdict[nsyms] = -elem_map[rhs] + if eqdict: + eqsdict.append(eqdict) + sdm_aug = SDM(enumerate(eqsdict), (neqs, nsyms + 1), K) + return sdm_aug + + +def _linear_eq_to_dict(eqs, syms): + """Convert a system Expr/Eq equations into dict form, returning + the coefficient dictionaries and a list of syms-independent terms + from each expression in ``eqs```. + + Examples + ======== + + >>> from sympy.polys.matrices.linsolve import _linear_eq_to_dict + >>> from sympy.abc import x + >>> _linear_eq_to_dict([2*x + 3], {x}) + ([{x: 2}], [3]) + """ + coeffs = [] + ind = [] + symset = set(syms) + for e in eqs: + if e.is_Equality: + coeff, terms = _lin_eq2dict(e.lhs, symset) + cR, tR = _lin_eq2dict(e.rhs, symset) + # there were no nonlinear errors so now + # cancellation is allowed + coeff -= cR + for k, v in tR.items(): + if k in terms: + terms[k] -= v + else: + terms[k] = -v + # don't store coefficients of 0, however + terms = {k: v for k, v in terms.items() if v} + c, d = coeff, terms + else: + c, d = _lin_eq2dict(e, symset) + coeffs.append(d) + ind.append(c) + return coeffs, ind + + +def _lin_eq2dict(a, symset): + """return (c, d) where c is the sym-independent part of ``a`` and + ``d`` is an efficiently calculated dictionary mapping symbols to + their coefficients. A PolyNonlinearError is raised if non-linearity + is detected. + + The values in the dictionary will be non-zero. + + Examples + ======== + + >>> from sympy.polys.matrices.linsolve import _lin_eq2dict + >>> from sympy.abc import x, y + >>> _lin_eq2dict(x + 2*y + 3, {x, y}) + (3, {x: 1, y: 2}) + """ + if a in symset: + return S.Zero, {a: S.One} + elif a.is_Add: + terms_list = defaultdict(list) + coeff_list = [] + for ai in a.args: + ci, ti = _lin_eq2dict(ai, symset) + coeff_list.append(ci) + for mij, cij in ti.items(): + terms_list[mij].append(cij) + coeff = Add(*coeff_list) + terms = {sym: Add(*coeffs) for sym, coeffs in terms_list.items()} + return coeff, terms + elif a.is_Mul: + terms = terms_coeff = None + coeff_list = [] + for ai in a.args: + ci, ti = _lin_eq2dict(ai, symset) + if not ti: + coeff_list.append(ci) + elif terms is None: + terms = ti + terms_coeff = ci + else: + # since ti is not null and we already have + # a term, this is a cross term + raise PolyNonlinearError(filldedent(''' + nonlinear cross-term: %s''' % a)) + coeff = Mul._from_args(coeff_list) + if terms is None: + return coeff, {} + else: + terms = {sym: coeff * c for sym, c in terms.items()} + return coeff * terms_coeff, terms + elif not a.has_xfree(symset): + return a, {} + else: + raise PolyNonlinearError('nonlinear term: %s' % a) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/lll.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/lll.py new file mode 100644 index 0000000000000000000000000000000000000000..f33f91d92c5e20f89f302991e494a6a5b9fa4b2e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/lll.py @@ -0,0 +1,94 @@ +from __future__ import annotations + +from math import floor as mfloor + +from sympy.polys.domains import ZZ, QQ +from sympy.polys.matrices.exceptions import DMRankError, DMShapeError, DMValueError, DMDomainError + + +def _ddm_lll(x, delta=QQ(3, 4), return_transform=False): + if QQ(1, 4) >= delta or delta >= QQ(1, 1): + raise DMValueError("delta must lie in range (0.25, 1)") + if x.shape[0] > x.shape[1]: + raise DMShapeError("input matrix must have shape (m, n) with m <= n") + if x.domain != ZZ: + raise DMDomainError("input matrix domain must be ZZ") + m = x.shape[0] + n = x.shape[1] + k = 1 + y = x.copy() + y_star = x.zeros((m, n), QQ) + mu = x.zeros((m, m), QQ) + g_star = [QQ(0, 1) for _ in range(m)] + half = QQ(1, 2) + T = x.eye(m, ZZ) if return_transform else None + linear_dependent_error = "input matrix contains linearly dependent rows" + + def closest_integer(x): + return ZZ(mfloor(x + half)) + + def lovasz_condition(k: int) -> bool: + return g_star[k] >= ((delta - mu[k][k - 1] ** 2) * g_star[k - 1]) + + def mu_small(k: int, j: int) -> bool: + return abs(mu[k][j]) <= half + + def dot_rows(x, y, rows: tuple[int, int]): + return sum(x[rows[0]][z] * y[rows[1]][z] for z in range(x.shape[1])) + + def reduce_row(T, mu, y, rows: tuple[int, int]): + r = closest_integer(mu[rows[0]][rows[1]]) + y[rows[0]] = [y[rows[0]][z] - r * y[rows[1]][z] for z in range(n)] + mu[rows[0]][:rows[1]] = [mu[rows[0]][z] - r * mu[rows[1]][z] for z in range(rows[1])] + mu[rows[0]][rows[1]] -= r + if return_transform: + T[rows[0]] = [T[rows[0]][z] - r * T[rows[1]][z] for z in range(m)] + + for i in range(m): + y_star[i] = [QQ.convert_from(z, ZZ) for z in y[i]] + for j in range(i): + row_dot = dot_rows(y, y_star, (i, j)) + try: + mu[i][j] = row_dot / g_star[j] + except ZeroDivisionError: + raise DMRankError(linear_dependent_error) + y_star[i] = [y_star[i][z] - mu[i][j] * y_star[j][z] for z in range(n)] + g_star[i] = dot_rows(y_star, y_star, (i, i)) + while k < m: + if not mu_small(k, k - 1): + reduce_row(T, mu, y, (k, k - 1)) + if lovasz_condition(k): + for l in range(k - 2, -1, -1): + if not mu_small(k, l): + reduce_row(T, mu, y, (k, l)) + k += 1 + else: + nu = mu[k][k - 1] + alpha = g_star[k] + nu ** 2 * g_star[k - 1] + try: + beta = g_star[k - 1] / alpha + except ZeroDivisionError: + raise DMRankError(linear_dependent_error) + mu[k][k - 1] = nu * beta + g_star[k] = g_star[k] * beta + g_star[k - 1] = alpha + y[k], y[k - 1] = y[k - 1], y[k] + mu[k][:k - 1], mu[k - 1][:k - 1] = mu[k - 1][:k - 1], mu[k][:k - 1] + for i in range(k + 1, m): + xi = mu[i][k] + mu[i][k] = mu[i][k - 1] - nu * xi + mu[i][k - 1] = mu[k][k - 1] * mu[i][k] + xi + if return_transform: + T[k], T[k - 1] = T[k - 1], T[k] + k = max(k - 1, 1) + assert all(lovasz_condition(i) for i in range(1, m)) + assert all(mu_small(i, j) for i in range(m) for j in range(i)) + return y, T + + +def ddm_lll(x, delta=QQ(3, 4)): + return _ddm_lll(x, delta=delta, return_transform=False)[0] + + +def ddm_lll_transform(x, delta=QQ(3, 4)): + return _ddm_lll(x, delta=delta, return_transform=True) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/normalforms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/normalforms.py new file mode 100644 index 0000000000000000000000000000000000000000..506a68b6946acbeb235eed7650246104da265b78 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/normalforms.py @@ -0,0 +1,540 @@ +'''Functions returning normal forms of matrices''' + +from collections import defaultdict + +from .domainmatrix import DomainMatrix +from .exceptions import DMDomainError, DMShapeError +from sympy.ntheory.modular import symmetric_residue +from sympy.polys.domains import QQ, ZZ + + +# TODO (future work): +# There are faster algorithms for Smith and Hermite normal forms, which +# we should implement. See e.g. the Kannan-Bachem algorithm: +# + + +def smith_normal_form(m): + ''' + Return the Smith Normal Form of a matrix `m` over the ring `domain`. + This will only work if the ring is a principal ideal domain. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.matrices.normalforms import smith_normal_form + >>> m = DomainMatrix([[ZZ(12), ZZ(6), ZZ(4)], + ... [ZZ(3), ZZ(9), ZZ(6)], + ... [ZZ(2), ZZ(16), ZZ(14)]], (3, 3), ZZ) + >>> print(smith_normal_form(m).to_Matrix()) + Matrix([[1, 0, 0], [0, 10, 0], [0, 0, 30]]) + + ''' + invs = invariant_factors(m) + smf = DomainMatrix.diag(invs, m.domain, m.shape) + return smf + + +def is_smith_normal_form(m): + ''' + Checks that the matrix is in Smith Normal Form + ''' + domain = m.domain + shape = m.shape + zero = domain.zero + m = m.to_list() + + for i in range(shape[0]): + for j in range(shape[1]): + if i == j: + continue + if not m[i][j] == zero: + return False + + upper = min(shape[0], shape[1]) + for i in range(1, upper): + if m[i-1][i-1] == zero: + if m[i][i] != zero: + return False + else: + r = domain.div(m[i][i], m[i-1][i-1])[1] + if r != zero: + return False + + return True + + +def add_columns(m, i, j, a, b, c, d): + # replace m[:, i] by a*m[:, i] + b*m[:, j] + # and m[:, j] by c*m[:, i] + d*m[:, j] + for k in range(len(m)): + e = m[k][i] + m[k][i] = a*e + b*m[k][j] + m[k][j] = c*e + d*m[k][j] + + +def invariant_factors(m): + ''' + Return the tuple of abelian invariants for a matrix `m` + (as in the Smith-Normal form) + + References + ========== + + [1] https://en.wikipedia.org/wiki/Smith_normal_form#Algorithm + [2] https://web.archive.org/web/20200331143852/https://sierra.nmsu.edu/morandi/notes/SmithNormalForm.pdf + + ''' + domain = m.domain + shape = m.shape + m = m.to_list() + return _smith_normal_decomp(m, domain, shape=shape, full=False) + + +def smith_normal_decomp(m): + ''' + Return the Smith-Normal form decomposition of matrix `m`. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.matrices.normalforms import smith_normal_decomp + >>> m = DomainMatrix([[ZZ(12), ZZ(6), ZZ(4)], + ... [ZZ(3), ZZ(9), ZZ(6)], + ... [ZZ(2), ZZ(16), ZZ(14)]], (3, 3), ZZ) + >>> a, s, t = smith_normal_decomp(m) + >>> assert a == s * m * t + ''' + domain = m.domain + rows, cols = shape = m.shape + m = m.to_list() + + invs, s, t = _smith_normal_decomp(m, domain, shape=shape, full=True) + smf = DomainMatrix.diag(invs, domain, shape).to_dense() + + s = DomainMatrix(s, domain=domain, shape=(rows, rows)) + t = DomainMatrix(t, domain=domain, shape=(cols, cols)) + return smf, s, t + + +def _smith_normal_decomp(m, domain, shape, full): + ''' + Return the tuple of abelian invariants for a matrix `m` + (as in the Smith-Normal form). If `full=True` then invertible matrices + ``s, t`` such that the product ``s, m, t`` is the Smith Normal Form + are also returned. + ''' + if not domain.is_PID: + msg = f"The matrix entries must be over a principal ideal domain, but got {domain}" + raise ValueError(msg) + + rows, cols = shape + zero = domain.zero + one = domain.one + + def eye(n): + return [[one if i == j else zero for i in range(n)] for j in range(n)] + + if 0 in shape: + if full: + return (), eye(rows), eye(cols) + else: + return () + + if full: + s = eye(rows) + t = eye(cols) + + def add_rows(m, i, j, a, b, c, d): + # replace m[i, :] by a*m[i, :] + b*m[j, :] + # and m[j, :] by c*m[i, :] + d*m[j, :] + for k in range(len(m[0])): + e = m[i][k] + m[i][k] = a*e + b*m[j][k] + m[j][k] = c*e + d*m[j][k] + + def clear_column(): + # make m[1:, 0] zero by row and column operations + pivot = m[0][0] + for j in range(1, rows): + if m[j][0] == zero: + continue + d, r = domain.div(m[j][0], pivot) + if r == zero: + add_rows(m, 0, j, 1, 0, -d, 1) + if full: + add_rows(s, 0, j, 1, 0, -d, 1) + else: + a, b, g = domain.gcdex(pivot, m[j][0]) + d_0 = domain.exquo(m[j][0], g) + d_j = domain.exquo(pivot, g) + add_rows(m, 0, j, a, b, d_0, -d_j) + if full: + add_rows(s, 0, j, a, b, d_0, -d_j) + pivot = g + + def clear_row(): + # make m[0, 1:] zero by row and column operations + pivot = m[0][0] + for j in range(1, cols): + if m[0][j] == zero: + continue + d, r = domain.div(m[0][j], pivot) + if r == zero: + add_columns(m, 0, j, 1, 0, -d, 1) + if full: + add_columns(t, 0, j, 1, 0, -d, 1) + else: + a, b, g = domain.gcdex(pivot, m[0][j]) + d_0 = domain.exquo(m[0][j], g) + d_j = domain.exquo(pivot, g) + add_columns(m, 0, j, a, b, d_0, -d_j) + if full: + add_columns(t, 0, j, a, b, d_0, -d_j) + pivot = g + + # permute the rows and columns until m[0,0] is non-zero if possible + ind = [i for i in range(rows) if m[i][0] != zero] + if ind and ind[0] != zero: + m[0], m[ind[0]] = m[ind[0]], m[0] + if full: + s[0], s[ind[0]] = s[ind[0]], s[0] + else: + ind = [j for j in range(cols) if m[0][j] != zero] + if ind and ind[0] != zero: + for row in m: + row[0], row[ind[0]] = row[ind[0]], row[0] + if full: + for row in t: + row[0], row[ind[0]] = row[ind[0]], row[0] + + # make the first row and column except m[0,0] zero + while (any(m[0][i] != zero for i in range(1,cols)) or + any(m[i][0] != zero for i in range(1,rows))): + clear_column() + clear_row() + + def to_domain_matrix(m): + return DomainMatrix(m, shape=(len(m), len(m[0])), domain=domain) + + if m[0][0] != 0: + c = domain.canonical_unit(m[0][0]) + if domain.is_Field: + c = 1 / m[0][0] + if c != domain.one: + m[0][0] *= c + if full: + s[0] = [elem * c for elem in s[0]] + + if 1 in shape: + invs = () + else: + lower_right = [r[1:] for r in m[1:]] + ret = _smith_normal_decomp(lower_right, domain, + shape=(rows - 1, cols - 1), full=full) + if full: + invs, s_small, t_small = ret + s2 = [[1] + [0]*(rows-1)] + [[0] + row for row in s_small] + t2 = [[1] + [0]*(cols-1)] + [[0] + row for row in t_small] + s, s2, t, t2 = list(map(to_domain_matrix, [s, s2, t, t2])) + s = s2 * s + t = t * t2 + s = s.to_list() + t = t.to_list() + else: + invs = ret + + if m[0][0]: + result = [m[0][0]] + result.extend(invs) + # in case m[0] doesn't divide the invariants of the rest of the matrix + for i in range(len(result)-1): + a, b = result[i], result[i+1] + if b and domain.div(b, a)[1] != zero: + if full: + x, y, d = domain.gcdex(a, b) + else: + d = domain.gcd(a, b) + + alpha = domain.div(a, d)[0] + if full: + beta = domain.div(b, d)[0] + add_rows(s, i, i + 1, 1, 0, x, 1) + add_columns(t, i, i + 1, 1, y, 0, 1) + add_rows(s, i, i + 1, 1, -alpha, 0, 1) + add_columns(t, i, i + 1, 1, 0, -beta, 1) + add_rows(s, i, i + 1, 0, 1, -1, 0) + + result[i+1] = b * alpha + result[i] = d + else: + break + else: + if full: + if rows > 1: + s = s[1:] + [s[0]] + if cols > 1: + t = [row[1:] + [row[0]] for row in t] + result = invs + (m[0][0],) + + if full: + return tuple(result), s, t + else: + return tuple(result) + + +def _gcdex(a, b): + r""" + This supports the functions that compute Hermite Normal Form. + + Explanation + =========== + + Let x, y be the coefficients returned by the extended Euclidean + Algorithm, so that x*a + y*b = g. In the algorithms for computing HNF, + it is critical that x, y not only satisfy the condition of being small + in magnitude -- namely that |x| <= |b|/g, |y| <- |a|/g -- but also that + y == 0 when a | b. + + """ + x, y, g = ZZ.gcdex(a, b) + if a != 0 and b % a == 0: + y = 0 + x = -1 if a < 0 else 1 + return x, y, g + + +def _hermite_normal_form(A): + r""" + Compute the Hermite Normal Form of DomainMatrix *A* over :ref:`ZZ`. + + Parameters + ========== + + A : :py:class:`~.DomainMatrix` over domain :ref:`ZZ`. + + Returns + ======= + + :py:class:`~.DomainMatrix` + The HNF of matrix *A*. + + Raises + ====== + + DMDomainError + If the domain of the matrix is not :ref:`ZZ`. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithm 2.4.5.) + + """ + if not A.domain.is_ZZ: + raise DMDomainError('Matrix must be over domain ZZ.') + # We work one row at a time, starting from the bottom row, and working our + # way up. + m, n = A.shape + A = A.to_ddm().copy() + # Our goal is to put pivot entries in the rightmost columns. + # Invariant: Before processing each row, k should be the index of the + # leftmost column in which we have so far put a pivot. + k = n + for i in range(m - 1, -1, -1): + if k == 0: + # This case can arise when n < m and we've already found n pivots. + # We don't need to consider any more rows, because this is already + # the maximum possible number of pivots. + break + k -= 1 + # k now points to the column in which we want to put a pivot. + # We want zeros in all entries to the left of the pivot column. + for j in range(k - 1, -1, -1): + if A[i][j] != 0: + # Replace cols j, k by lin combs of these cols such that, in row i, + # col j has 0, while col k has the gcd of their row i entries. Note + # that this ensures a nonzero entry in col k. + u, v, d = _gcdex(A[i][k], A[i][j]) + r, s = A[i][k] // d, A[i][j] // d + add_columns(A, k, j, u, v, -s, r) + b = A[i][k] + # Do not want the pivot entry to be negative. + if b < 0: + add_columns(A, k, k, -1, 0, -1, 0) + b = -b + # The pivot entry will be 0 iff the row was 0 from the pivot col all the + # way to the left. In this case, we are still working on the same pivot + # col for the next row. Therefore: + if b == 0: + k += 1 + # If the pivot entry is nonzero, then we want to reduce all entries to its + # right in the sense of the division algorithm, i.e. make them all remainders + # w.r.t. the pivot as divisor. + else: + for j in range(k + 1, n): + q = A[i][j] // b + add_columns(A, j, k, 1, -q, 0, 1) + # Finally, the HNF consists of those columns of A in which we succeeded in making + # a nonzero pivot. + return DomainMatrix.from_rep(A.to_dfm_or_ddm())[:, k:] + + +def _hermite_normal_form_modulo_D(A, D): + r""" + Perform the mod *D* Hermite Normal Form reduction algorithm on + :py:class:`~.DomainMatrix` *A*. + + Explanation + =========== + + If *A* is an $m \times n$ matrix of rank $m$, having Hermite Normal Form + $W$, and if *D* is any positive integer known in advance to be a multiple + of $\det(W)$, then the HNF of *A* can be computed by an algorithm that + works mod *D* in order to prevent coefficient explosion. + + Parameters + ========== + + A : :py:class:`~.DomainMatrix` over :ref:`ZZ` + $m \times n$ matrix, having rank $m$. + D : :ref:`ZZ` + Positive integer, known to be a multiple of the determinant of the + HNF of *A*. + + Returns + ======= + + :py:class:`~.DomainMatrix` + The HNF of matrix *A*. + + Raises + ====== + + DMDomainError + If the domain of the matrix is not :ref:`ZZ`, or + if *D* is given but is not in :ref:`ZZ`. + + DMShapeError + If the matrix has more rows than columns. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithm 2.4.8.) + + """ + if not A.domain.is_ZZ: + raise DMDomainError('Matrix must be over domain ZZ.') + if not ZZ.of_type(D) or D < 1: + raise DMDomainError('Modulus D must be positive element of domain ZZ.') + + def add_columns_mod_R(m, R, i, j, a, b, c, d): + # replace m[:, i] by (a*m[:, i] + b*m[:, j]) % R + # and m[:, j] by (c*m[:, i] + d*m[:, j]) % R + for k in range(len(m)): + e = m[k][i] + m[k][i] = symmetric_residue((a * e + b * m[k][j]) % R, R) + m[k][j] = symmetric_residue((c * e + d * m[k][j]) % R, R) + + W = defaultdict(dict) + + m, n = A.shape + if n < m: + raise DMShapeError('Matrix must have at least as many columns as rows.') + A = A.to_list() + k = n + R = D + for i in range(m - 1, -1, -1): + k -= 1 + for j in range(k - 1, -1, -1): + if A[i][j] != 0: + u, v, d = _gcdex(A[i][k], A[i][j]) + r, s = A[i][k] // d, A[i][j] // d + add_columns_mod_R(A, R, k, j, u, v, -s, r) + b = A[i][k] + if b == 0: + A[i][k] = b = R + u, v, d = _gcdex(b, R) + for ii in range(m): + W[ii][i] = u*A[ii][k] % R + if W[i][i] == 0: + W[i][i] = R + for j in range(i + 1, m): + q = W[i][j] // W[i][i] + add_columns(W, j, i, 1, -q, 0, 1) + R //= d + return DomainMatrix(W, (m, m), ZZ).to_dense() + + +def hermite_normal_form(A, *, D=None, check_rank=False): + r""" + Compute the Hermite Normal Form of :py:class:`~.DomainMatrix` *A* over + :ref:`ZZ`. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.matrices.normalforms import hermite_normal_form + >>> m = DomainMatrix([[ZZ(12), ZZ(6), ZZ(4)], + ... [ZZ(3), ZZ(9), ZZ(6)], + ... [ZZ(2), ZZ(16), ZZ(14)]], (3, 3), ZZ) + >>> print(hermite_normal_form(m).to_Matrix()) + Matrix([[10, 0, 2], [0, 15, 3], [0, 0, 2]]) + + Parameters + ========== + + A : $m \times n$ ``DomainMatrix`` over :ref:`ZZ`. + + D : :ref:`ZZ`, optional + Let $W$ be the HNF of *A*. If known in advance, a positive integer *D* + being any multiple of $\det(W)$ may be provided. In this case, if *A* + also has rank $m$, then we may use an alternative algorithm that works + mod *D* in order to prevent coefficient explosion. + + check_rank : boolean, optional (default=False) + The basic assumption is that, if you pass a value for *D*, then + you already believe that *A* has rank $m$, so we do not waste time + checking it for you. If you do want this to be checked (and the + ordinary, non-modulo *D* algorithm to be used if the check fails), then + set *check_rank* to ``True``. + + Returns + ======= + + :py:class:`~.DomainMatrix` + The HNF of matrix *A*. + + Raises + ====== + + DMDomainError + If the domain of the matrix is not :ref:`ZZ`, or + if *D* is given but is not in :ref:`ZZ`. + + DMShapeError + If the mod *D* algorithm is used but the matrix has more rows than + columns. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithms 2.4.5 and 2.4.8.) + + """ + if not A.domain.is_ZZ: + raise DMDomainError('Matrix must be over domain ZZ.') + if D is not None and (not check_rank or A.convert_to(QQ).rank() == A.shape[0]): + return _hermite_normal_form_modulo_D(A, D) + else: + return _hermite_normal_form(A) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/rref.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/rref.py new file mode 100644 index 0000000000000000000000000000000000000000..c5a71b04971e8dc8ecac5cc2691f98ba68e35d45 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/rref.py @@ -0,0 +1,422 @@ +# Algorithms for computing the reduced row echelon form of a matrix. +# +# We need to choose carefully which algorithms to use depending on the domain, +# shape, and sparsity of the matrix as well as things like the bit count in the +# case of ZZ or QQ. This is important because the algorithms have different +# performance characteristics in the extremes of dense vs sparse. +# +# In all cases we use the sparse implementations but we need to choose between +# Gauss-Jordan elimination with division and fraction-free Gauss-Jordan +# elimination. For very sparse matrices over ZZ with low bit counts it is +# asymptotically faster to use Gauss-Jordan elimination with division. For +# dense matrices with high bit counts it is asymptotically faster to use +# fraction-free Gauss-Jordan. +# +# The most important thing is to get the extreme cases right because it can +# make a big difference. In between the extremes though we have to make a +# choice and here we use empirically determined thresholds based on timings +# with random sparse matrices. +# +# In the case of QQ we have to consider the denominators as well. If the +# denominators are small then it is faster to clear them and use fraction-free +# Gauss-Jordan over ZZ. If the denominators are large then it is faster to use +# Gauss-Jordan elimination with division over QQ. +# +# Timings for the various algorithms can be found at +# +# https://github.com/sympy/sympy/issues/25410 +# https://github.com/sympy/sympy/pull/25443 + +from sympy.polys.domains import ZZ + +from sympy.polys.matrices.sdm import SDM, sdm_irref, sdm_rref_den +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.dense import ddm_irref, ddm_irref_den + + +def _dm_rref(M, *, method='auto'): + """ + Compute the reduced row echelon form of a ``DomainMatrix``. + + This function is the implementation of :meth:`DomainMatrix.rref`. + + Chooses the best algorithm depending on the domain, shape, and sparsity of + the matrix as well as things like the bit count in the case of :ref:`ZZ` or + :ref:`QQ`. The result is returned over the field associated with the domain + of the Matrix. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref + The ``DomainMatrix`` method that calls this function. + sympy.polys.matrices.rref._dm_rref_den + Alternative function for computing RREF with denominator. + """ + method, use_fmt = _dm_rref_choose_method(M, method, denominator=False) + + M, old_fmt = _dm_to_fmt(M, use_fmt) + + if method == 'GJ': + # Use Gauss-Jordan with division over the associated field. + Mf = _to_field(M) + M_rref, pivots = _dm_rref_GJ(Mf) + + elif method == 'FF': + # Use fraction-free GJ over the current domain. + M_rref_f, den, pivots = _dm_rref_den_FF(M) + M_rref = _to_field(M_rref_f) / den + + elif method == 'CD': + # Clear denominators and use fraction-free GJ in the associated ring. + _, Mr = M.clear_denoms_rowwise(convert=True) + M_rref_f, den, pivots = _dm_rref_den_FF(Mr) + M_rref = _to_field(M_rref_f) / den + + else: + raise ValueError(f"Unknown method for rref: {method}") + + M_rref, _ = _dm_to_fmt(M_rref, old_fmt) + + # Invariants: + # - M_rref is in the same format (sparse or dense) as the input matrix. + # - M_rref is in the associated field domain and any denominator was + # divided in (so is implicitly 1 now). + + return M_rref, pivots + + +def _dm_rref_den(M, *, keep_domain=True, method='auto'): + """ + Compute the reduced row echelon form of a ``DomainMatrix`` with denominator. + + This function is the implementation of :meth:`DomainMatrix.rref_den`. + + Chooses the best algorithm depending on the domain, shape, and sparsity of + the matrix as well as things like the bit count in the case of :ref:`ZZ` or + :ref:`QQ`. The result is returned over the same domain as the input matrix + unless ``keep_domain=False`` in which case the result might be over an + associated ring or field domain. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref_den + The ``DomainMatrix`` method that calls this function. + sympy.polys.matrices.rref._dm_rref + Alternative function for computing RREF without denominator. + """ + method, use_fmt = _dm_rref_choose_method(M, method, denominator=True) + + M, old_fmt = _dm_to_fmt(M, use_fmt) + + if method == 'FF': + # Use fraction-free GJ over the current domain. + M_rref, den, pivots = _dm_rref_den_FF(M) + + elif method == 'GJ': + # Use Gauss-Jordan with division over the associated field. + M_rref_f, pivots = _dm_rref_GJ(_to_field(M)) + + # Convert back to the ring? + if keep_domain and M_rref_f.domain != M.domain: + _, M_rref = M_rref_f.clear_denoms(convert=True) + + if pivots: + den = M_rref[0, pivots[0]].element + else: + den = M_rref.domain.one + else: + # Possibly an associated field + M_rref = M_rref_f + den = M_rref.domain.one + + elif method == 'CD': + # Clear denominators and use fraction-free GJ in the associated ring. + _, Mr = M.clear_denoms_rowwise(convert=True) + + M_rref_r, den, pivots = _dm_rref_den_FF(Mr) + + if keep_domain and M_rref_r.domain != M.domain: + # Convert back to the field + M_rref = _to_field(M_rref_r) / den + den = M.domain.one + else: + # Possibly an associated ring + M_rref = M_rref_r + + if pivots: + den = M_rref[0, pivots[0]].element + else: + den = M_rref.domain.one + else: + raise ValueError(f"Unknown method for rref: {method}") + + M_rref, _ = _dm_to_fmt(M_rref, old_fmt) + + # Invariants: + # - M_rref is in the same format (sparse or dense) as the input matrix. + # - If keep_domain=True then M_rref and den are in the same domain as the + # input matrix + # - If keep_domain=False then M_rref might be in an associated ring or + # field domain but den is always in the same domain as M_rref. + + return M_rref, den, pivots + + +def _dm_to_fmt(M, fmt): + """Convert a matrix to the given format and return the old format.""" + old_fmt = M.rep.fmt + if old_fmt == fmt: + pass + elif fmt == 'dense': + M = M.to_dense() + elif fmt == 'sparse': + M = M.to_sparse() + else: + raise ValueError(f'Unknown format: {fmt}') # pragma: no cover + return M, old_fmt + + +# These are the four basic implementations that we want to choose between: + + +def _dm_rref_GJ(M): + """Compute RREF using Gauss-Jordan elimination with division.""" + if M.rep.fmt == 'sparse': + return _dm_rref_GJ_sparse(M) + else: + return _dm_rref_GJ_dense(M) + + +def _dm_rref_den_FF(M): + """Compute RREF using fraction-free Gauss-Jordan elimination.""" + if M.rep.fmt == 'sparse': + return _dm_rref_den_FF_sparse(M) + else: + return _dm_rref_den_FF_dense(M) + + +def _dm_rref_GJ_sparse(M): + """Compute RREF using sparse Gauss-Jordan elimination with division.""" + M_rref_d, pivots, _ = sdm_irref(M.rep) + M_rref_sdm = SDM(M_rref_d, M.shape, M.domain) + pivots = tuple(pivots) + return M.from_rep(M_rref_sdm), pivots + + +def _dm_rref_GJ_dense(M): + """Compute RREF using dense Gauss-Jordan elimination with division.""" + partial_pivot = M.domain.is_RR or M.domain.is_CC + ddm = M.rep.to_ddm().copy() + pivots = ddm_irref(ddm, _partial_pivot=partial_pivot) + M_rref_ddm = DDM(ddm, M.shape, M.domain) + pivots = tuple(pivots) + return M.from_rep(M_rref_ddm.to_dfm_or_ddm()), pivots + + +def _dm_rref_den_FF_sparse(M): + """Compute RREF using sparse fraction-free Gauss-Jordan elimination.""" + M_rref_d, den, pivots = sdm_rref_den(M.rep, M.domain) + M_rref_sdm = SDM(M_rref_d, M.shape, M.domain) + pivots = tuple(pivots) + return M.from_rep(M_rref_sdm), den, pivots + + +def _dm_rref_den_FF_dense(M): + """Compute RREF using sparse fraction-free Gauss-Jordan elimination.""" + ddm = M.rep.to_ddm().copy() + den, pivots = ddm_irref_den(ddm, M.domain) + M_rref_ddm = DDM(ddm, M.shape, M.domain) + pivots = tuple(pivots) + return M.from_rep(M_rref_ddm.to_dfm_or_ddm()), den, pivots + + +def _dm_rref_choose_method(M, method, *, denominator=False): + """Choose the fastest method for computing RREF for M.""" + + if method != 'auto': + if method.endswith('_dense'): + method = method[:-len('_dense')] + use_fmt = 'dense' + else: + use_fmt = 'sparse' + + else: + # The sparse implementations are always faster + use_fmt = 'sparse' + + K = M.domain + + if K.is_ZZ: + method = _dm_rref_choose_method_ZZ(M, denominator=denominator) + elif K.is_QQ: + method = _dm_rref_choose_method_QQ(M, denominator=denominator) + elif K.is_RR or K.is_CC: + # TODO: Add partial pivot support to the sparse implementations. + method = 'GJ' + use_fmt = 'dense' + elif K.is_EX and M.rep.fmt == 'dense' and not denominator: + # Do not switch to the sparse implementation for EX because the + # domain does not have proper canonicalization and the sparse + # implementation gives equivalent but non-identical results over EX + # from performing arithmetic in a different order. Specifically + # test_issue_23718 ends up getting a more complicated expression + # when using the sparse implementation. Probably the best fix for + # this is something else but for now we stick with the dense + # implementation for EX if the matrix is already dense. + method = 'GJ' + use_fmt = 'dense' + else: + # This is definitely suboptimal. More work is needed to determine + # the best method for computing RREF over different domains. + if denominator: + method = 'FF' + else: + method = 'GJ' + + return method, use_fmt + + +def _dm_rref_choose_method_QQ(M, *, denominator=False): + """Choose the fastest method for computing RREF over QQ.""" + # The same sorts of considerations apply here as in the case of ZZ. Here + # though a new more significant consideration is what sort of denominators + # we have and what to do with them so we focus on that. + + # First compute the density. This is the average number of non-zero entries + # per row but only counting rows that have at least one non-zero entry + # since RREF can ignore fully zero rows. + density, _, ncols = _dm_row_density(M) + + # For sparse matrices use Gauss-Jordan elimination over QQ regardless. + if density < min(5, ncols/2): + return 'GJ' + + # Compare the bit-length of the lcm of the denominators to the bit length + # of the numerators. + # + # The threshold here is empirical: we prefer rref over QQ if clearing + # denominators would result in a numerator matrix having 5x the bit size of + # the current numerators. + numers, denoms = _dm_QQ_numers_denoms(M) + numer_bits = max([n.bit_length() for n in numers], default=1) + + denom_lcm = ZZ.one + for d in denoms: + denom_lcm = ZZ.lcm(denom_lcm, d) + if denom_lcm.bit_length() > 5*numer_bits: + return 'GJ' + + # If we get here then the matrix is dense and the lcm of the denominators + # is not too large compared to the numerators. For particularly small + # denominators it is fastest just to clear them and use fraction-free + # Gauss-Jordan over ZZ. With very small denominators this is a little + # faster than using rref_den over QQ but there is an intermediate regime + # where rref_den over QQ is significantly faster. The small denominator + # case is probably very common because small fractions like 1/2 or 1/3 are + # often seen in user inputs. + + if denom_lcm.bit_length() < 50: + return 'CD' + else: + return 'FF' + + +def _dm_rref_choose_method_ZZ(M, *, denominator=False): + """Choose the fastest method for computing RREF over ZZ.""" + # In the extreme of very sparse matrices and low bit counts it is faster to + # use Gauss-Jordan elimination over QQ rather than fraction-free + # Gauss-Jordan over ZZ. In the opposite extreme of dense matrices and high + # bit counts it is faster to use fraction-free Gauss-Jordan over ZZ. These + # two extreme cases need to be handled differently because they lead to + # different asymptotic complexities. In between these two extremes we need + # a threshold for deciding which method to use. This threshold is + # determined empirically by timing the two methods with random matrices. + + # The disadvantage of using empirical timings is that future optimisations + # might change the relative speeds so this can easily become out of date. + # The main thing is to get the asymptotic complexity right for the extreme + # cases though so the precise value of the threshold is hopefully not too + # important. + + # Empirically determined parameter. + PARAM = 10000 + + # First compute the density. This is the average number of non-zero entries + # per row but only counting rows that have at least one non-zero entry + # since RREF can ignore fully zero rows. + density, nrows_nz, ncols = _dm_row_density(M) + + # For small matrices use QQ if more than half the entries are zero. + if nrows_nz < 10: + if density < ncols/2: + return 'GJ' + else: + return 'FF' + + # These are just shortcuts for the formula below. + if density < 5: + return 'GJ' + elif density > 5 + PARAM/nrows_nz: + return 'FF' # pragma: no cover + + # Maximum bitsize of any entry. + elements = _dm_elements(M) + bits = max([e.bit_length() for e in elements], default=1) + + # Wideness parameter. This is 1 for square or tall matrices but >1 for wide + # matrices. + wideness = max(1, 2/3*ncols/nrows_nz) + + max_density = (5 + PARAM/(nrows_nz*bits**2)) * wideness + + if density < max_density: + return 'GJ' + else: + return 'FF' + + +def _dm_row_density(M): + """Density measure for sparse matrices. + + Defines the "density", ``d`` as the average number of non-zero entries per + row except ignoring rows that are fully zero. RREF can ignore fully zero + rows so they are excluded. By definition ``d >= 1`` except that we define + ``d = 0`` for the zero matrix. + + Returns ``(density, nrows_nz, ncols)`` where ``nrows_nz`` counts the number + of nonzero rows and ``ncols`` is the number of columns. + """ + # Uses the SDM dict-of-dicts representation. + ncols = M.shape[1] + rows_nz = M.rep.to_sdm().values() + if not rows_nz: + return 0, 0, ncols + else: + nrows_nz = len(rows_nz) + density = sum(map(len, rows_nz)) / nrows_nz + return density, nrows_nz, ncols + + +def _dm_elements(M): + """Return nonzero elements of a DomainMatrix.""" + elements, _ = M.to_flat_nz() + return elements + + +def _dm_QQ_numers_denoms(Mq): + """Returns the numerators and denominators of a DomainMatrix over QQ.""" + elements = _dm_elements(Mq) + numers = [e.numerator for e in elements] + denoms = [e.denominator for e in elements] + return numers, denoms + + +def _to_field(M): + """Convert a DomainMatrix to a field if possible.""" + K = M.domain + if K.has_assoc_Field: + return M.to_field() + else: + return M diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/sdm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/sdm.py new file mode 100644 index 0000000000000000000000000000000000000000..84558d83b6f58a3a9074d31f1a315ac901cd68da --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/sdm.py @@ -0,0 +1,2197 @@ +""" + +Module for the SDM class. + +""" + +from operator import add, neg, pos, sub, mul +from collections import defaultdict + +from sympy.external.gmpy import GROUND_TYPES +from sympy.utilities.decorator import doctest_depends_on +from sympy.utilities.iterables import _strongly_connected_components + +from .exceptions import DMBadInputError, DMDomainError, DMShapeError + +from sympy.polys.domains import QQ + +from .ddm import DDM + + +if GROUND_TYPES != 'flint': + __doctest_skip__ = ['SDM.to_dfm', 'SDM.to_dfm_or_ddm'] + + +class SDM(dict): + r"""Sparse matrix based on polys domain elements + + This is a dict subclass and is a wrapper for a dict of dicts that supports + basic matrix arithmetic +, -, *, **. + + + In order to create a new :py:class:`~.SDM`, a dict + of dicts mapping non-zero elements to their + corresponding row and column in the matrix is needed. + + We also need to specify the shape and :py:class:`~.Domain` + of our :py:class:`~.SDM` object. + + We declare a 2x2 :py:class:`~.SDM` matrix belonging + to QQ domain as shown below. + The 2x2 Matrix in the example is + + .. math:: + A = \left[\begin{array}{ccc} + 0 & \frac{1}{2} \\ + 0 & 0 \end{array} \right] + + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> elemsdict = {0:{1:QQ(1, 2)}} + >>> A = SDM(elemsdict, (2, 2), QQ) + >>> A + {0: {1: 1/2}} + + We can manipulate :py:class:`~.SDM` the same way + as a Matrix class + + >>> from sympy import ZZ + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> B = SDM({0:{0: ZZ(3)}, 1:{1:ZZ(4)}}, (2, 2), ZZ) + >>> A + B + {0: {0: 3, 1: 2}, 1: {0: 1, 1: 4}} + + Multiplication + + >>> A*B + {0: {1: 8}, 1: {0: 3}} + >>> A*ZZ(2) + {0: {1: 4}, 1: {0: 2}} + + """ + + fmt = 'sparse' + is_DFM = False + is_DDM = False + + def __init__(self, elemsdict, shape, domain): + super().__init__(elemsdict) + self.shape = self.rows, self.cols = m, n = shape + self.domain = domain + + if not all(0 <= r < m for r in self): + raise DMBadInputError("Row out of range") + if not all(0 <= c < n for row in self.values() for c in row): + raise DMBadInputError("Column out of range") + + def getitem(self, i, j): + try: + return self[i][j] + except KeyError: + m, n = self.shape + if -m <= i < m and -n <= j < n: + try: + return self[i % m][j % n] + except KeyError: + return self.domain.zero + else: + raise IndexError("index out of range") + + def setitem(self, i, j, value): + m, n = self.shape + if not (-m <= i < m and -n <= j < n): + raise IndexError("index out of range") + i, j = i % m, j % n + if value: + try: + self[i][j] = value + except KeyError: + self[i] = {j: value} + else: + rowi = self.get(i, None) + if rowi is not None: + try: + del rowi[j] + except KeyError: + pass + else: + if not rowi: + del self[i] + + def extract_slice(self, slice1, slice2): + m, n = self.shape + ri = range(m)[slice1] + ci = range(n)[slice2] + + sdm = {} + for i, row in self.items(): + if i in ri: + row = {ci.index(j): e for j, e in row.items() if j in ci} + if row: + sdm[ri.index(i)] = row + + return self.new(sdm, (len(ri), len(ci)), self.domain) + + def extract(self, rows, cols): + if not (self and rows and cols): + return self.zeros((len(rows), len(cols)), self.domain) + + m, n = self.shape + if not (-m <= min(rows) <= max(rows) < m): + raise IndexError('Row index out of range') + if not (-n <= min(cols) <= max(cols) < n): + raise IndexError('Column index out of range') + + # rows and cols can contain duplicates e.g. M[[1, 2, 2], [0, 1]] + # Build a map from row/col in self to list of rows/cols in output + rowmap = defaultdict(list) + colmap = defaultdict(list) + for i2, i1 in enumerate(rows): + rowmap[i1 % m].append(i2) + for j2, j1 in enumerate(cols): + colmap[j1 % n].append(j2) + + # Used to efficiently skip zero rows/cols + rowset = set(rowmap) + colset = set(colmap) + + sdm1 = self + sdm2 = {} + for i1 in rowset & sdm1.keys(): + row1 = sdm1[i1] + row2 = {} + for j1 in colset & row1.keys(): + row1_j1 = row1[j1] + for j2 in colmap[j1]: + row2[j2] = row1_j1 + if row2: + for i2 in rowmap[i1]: + sdm2[i2] = row2.copy() + + return self.new(sdm2, (len(rows), len(cols)), self.domain) + + def __str__(self): + rowsstr = [] + for i, row in self.items(): + elemsstr = ', '.join('%s: %s' % (j, elem) for j, elem in row.items()) + rowsstr.append('%s: {%s}' % (i, elemsstr)) + return '{%s}' % ', '.join(rowsstr) + + def __repr__(self): + cls = type(self).__name__ + rows = dict.__repr__(self) + return '%s(%s, %s, %s)' % (cls, rows, self.shape, self.domain) + + @classmethod + def new(cls, sdm, shape, domain): + """ + + Parameters + ========== + + sdm: A dict of dicts for non-zero elements in SDM + shape: tuple representing dimension of SDM + domain: Represents :py:class:`~.Domain` of SDM + + Returns + ======= + + An :py:class:`~.SDM` object + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> elemsdict = {0:{1: QQ(2)}} + >>> A = SDM.new(elemsdict, (2, 2), QQ) + >>> A + {0: {1: 2}} + + """ + return cls(sdm, shape, domain) + + def copy(A): + """ + Returns the copy of a :py:class:`~.SDM` object + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> elemsdict = {0:{1:QQ(2)}, 1:{}} + >>> A = SDM(elemsdict, (2, 2), QQ) + >>> B = A.copy() + >>> B + {0: {1: 2}, 1: {}} + + """ + Ac = {i: Ai.copy() for i, Ai in A.items()} + return A.new(Ac, A.shape, A.domain) + + @classmethod + def from_list(cls, ddm, shape, domain): + """ + Create :py:class:`~.SDM` object from a list of lists. + + Parameters + ========== + + ddm: + list of lists containing domain elements + shape: + Dimensions of :py:class:`~.SDM` matrix + domain: + Represents :py:class:`~.Domain` of :py:class:`~.SDM` object + + Returns + ======= + + :py:class:`~.SDM` containing elements of ddm + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> ddm = [[QQ(1, 2), QQ(0)], [QQ(0), QQ(3, 4)]] + >>> A = SDM.from_list(ddm, (2, 2), QQ) + >>> A + {0: {0: 1/2}, 1: {1: 3/4}} + + See Also + ======== + + to_list + from_list_flat + from_dok + from_ddm + """ + + m, n = shape + if not (len(ddm) == m and all(len(row) == n for row in ddm)): + raise DMBadInputError("Inconsistent row-list/shape") + getrow = lambda i: {j:ddm[i][j] for j in range(n) if ddm[i][j]} + irows = ((i, getrow(i)) for i in range(m)) + sdm = {i: row for i, row in irows if row} + return cls(sdm, shape, domain) + + @classmethod + def from_ddm(cls, ddm): + """ + Create :py:class:`~.SDM` from a :py:class:`~.DDM`. + + Examples + ======== + + >>> from sympy.polys.matrices.ddm import DDM + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> ddm = DDM( [[QQ(1, 2), 0], [0, QQ(3, 4)]], (2, 2), QQ) + >>> A = SDM.from_ddm(ddm) + >>> A + {0: {0: 1/2}, 1: {1: 3/4}} + >>> SDM.from_ddm(ddm).to_ddm() == ddm + True + + See Also + ======== + + to_ddm + from_list + from_list_flat + from_dok + """ + return cls.from_list(ddm, ddm.shape, ddm.domain) + + def to_list(M): + """ + Convert a :py:class:`~.SDM` object to a list of lists. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> elemsdict = {0:{1:QQ(2)}, 1:{}} + >>> A = SDM(elemsdict, (2, 2), QQ) + >>> A.to_list() + [[0, 2], [0, 0]] + + + """ + m, n = M.shape + zero = M.domain.zero + ddm = [[zero] * n for _ in range(m)] + for i, row in M.items(): + for j, e in row.items(): + ddm[i][j] = e + return ddm + + def to_list_flat(M): + """ + Convert :py:class:`~.SDM` to a flat list. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{0: QQ(3)}}, (2, 2), QQ) + >>> A.to_list_flat() + [0, 2, 3, 0] + >>> A == A.from_list_flat(A.to_list_flat(), A.shape, A.domain) + True + + See Also + ======== + + from_list_flat + to_list + to_dok + to_ddm + """ + m, n = M.shape + zero = M.domain.zero + flat = [zero] * (m * n) + for i, row in M.items(): + for j, e in row.items(): + flat[i*n + j] = e + return flat + + @classmethod + def from_list_flat(cls, elements, shape, domain): + """ + Create :py:class:`~.SDM` from a flat list of elements. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM.from_list_flat([QQ(0), QQ(2), QQ(0), QQ(0)], (2, 2), QQ) + >>> A + {0: {1: 2}} + >>> A == A.from_list_flat(A.to_list_flat(), A.shape, A.domain) + True + + See Also + ======== + + to_list_flat + from_list + from_dok + from_ddm + """ + m, n = shape + if len(elements) != m * n: + raise DMBadInputError("Inconsistent flat-list shape") + sdm = defaultdict(dict) + for inj, element in enumerate(elements): + if element: + i, j = divmod(inj, n) + sdm[i][j] = element + return cls(sdm, shape, domain) + + def to_flat_nz(M): + """ + Convert :class:`SDM` to a flat list of nonzero elements and data. + + Explanation + =========== + + This is used to operate on a list of the elements of a matrix and then + reconstruct a modified matrix with elements in the same positions using + :meth:`from_flat_nz`. Zero elements are omitted from the list. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{0: QQ(3)}}, (2, 2), QQ) + >>> elements, data = A.to_flat_nz() + >>> elements + [2, 3] + >>> A == A.from_flat_nz(elements, data, A.domain) + True + + See Also + ======== + + from_flat_nz + to_list_flat + sympy.polys.matrices.ddm.DDM.to_flat_nz + sympy.polys.matrices.domainmatrix.DomainMatrix.to_flat_nz + """ + dok = M.to_dok() + indices = tuple(dok) + elements = list(dok.values()) + data = (indices, M.shape) + return elements, data + + @classmethod + def from_flat_nz(cls, elements, data, domain): + """ + Reconstruct a :class:`~.SDM` after calling :meth:`to_flat_nz`. + + See :meth:`to_flat_nz` for explanation. + + See Also + ======== + + to_flat_nz + from_list_flat + sympy.polys.matrices.ddm.DDM.from_flat_nz + sympy.polys.matrices.domainmatrix.DomainMatrix.from_flat_nz + """ + indices, shape = data + dok = dict(zip(indices, elements)) + return cls.from_dok(dok, shape, domain) + + def to_dod(M): + """ + Convert to dictionary of dictionaries (dod) format. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0: {1: QQ(2)}, 1: {0: QQ(3)}}, (2, 2), QQ) + >>> A.to_dod() + {0: {1: 2}, 1: {0: 3}} + + See Also + ======== + + from_dod + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dod + """ + return {i: row.copy() for i, row in M.items()} + + @classmethod + def from_dod(cls, dod, shape, domain): + """ + Create :py:class:`~.SDM` from dictionary of dictionaries (dod) format. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> dod = {0: {1: QQ(2)}, 1: {0: QQ(3)}} + >>> A = SDM.from_dod(dod, (2, 2), QQ) + >>> A + {0: {1: 2}, 1: {0: 3}} + >>> A == SDM.from_dod(A.to_dod(), A.shape, A.domain) + True + + See Also + ======== + + to_dod + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dod + """ + sdm = defaultdict(dict) + for i, row in dod.items(): + for j, e in row.items(): + if e: + sdm[i][j] = e + return cls(sdm, shape, domain) + + def to_dok(M): + """ + Convert to dictionary of keys (dok) format. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0: {1: QQ(2)}, 1: {0: QQ(3)}}, (2, 2), QQ) + >>> A.to_dok() + {(0, 1): 2, (1, 0): 3} + + See Also + ======== + + from_dok + to_list + to_list_flat + to_ddm + """ + return {(i, j): e for i, row in M.items() for j, e in row.items()} + + @classmethod + def from_dok(cls, dok, shape, domain): + """ + Create :py:class:`~.SDM` from dictionary of keys (dok) format. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> dok = {(0, 1): QQ(2), (1, 0): QQ(3)} + >>> A = SDM.from_dok(dok, (2, 2), QQ) + >>> A + {0: {1: 2}, 1: {0: 3}} + >>> A == SDM.from_dok(A.to_dok(), A.shape, A.domain) + True + + See Also + ======== + + to_dok + from_list + from_list_flat + from_ddm + """ + sdm = defaultdict(dict) + for (i, j), e in dok.items(): + if e: + sdm[i][j] = e + return cls(sdm, shape, domain) + + def iter_values(M): + """ + Iterate over the nonzero values of a :py:class:`~.SDM` matrix. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0: {1: QQ(2)}, 1: {0: QQ(3)}}, (2, 2), QQ) + >>> list(A.iter_values()) + [2, 3] + + """ + for row in M.values(): + yield from row.values() + + def iter_items(M): + """ + Iterate over indices and values of the nonzero elements. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0: {1: QQ(2)}, 1: {0: QQ(3)}}, (2, 2), QQ) + >>> list(A.iter_items()) + [((0, 1), 2), ((1, 0), 3)] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.iter_items + """ + for i, row in M.items(): + for j, e in row.items(): + yield (i, j), e + + def to_ddm(M): + """ + Convert a :py:class:`~.SDM` object to a :py:class:`~.DDM` object + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{}}, (2, 2), QQ) + >>> A.to_ddm() + [[0, 2], [0, 0]] + + """ + return DDM(M.to_list(), M.shape, M.domain) + + def to_sdm(M): + """ + Convert to :py:class:`~.SDM` format (returns self). + """ + return M + + @doctest_depends_on(ground_types=['flint']) + def to_dfm(M): + """ + Convert a :py:class:`~.SDM` object to a :py:class:`~.DFM` object + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{}}, (2, 2), QQ) + >>> A.to_dfm() + [[0, 2], [0, 0]] + + See Also + ======== + + to_ddm + to_dfm_or_ddm + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dfm + """ + return M.to_ddm().to_dfm() + + @doctest_depends_on(ground_types=['flint']) + def to_dfm_or_ddm(M): + """ + Convert to :py:class:`~.DFM` if possible, else :py:class:`~.DDM`. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{}}, (2, 2), QQ) + >>> A.to_dfm_or_ddm() + [[0, 2], [0, 0]] + >>> type(A.to_dfm_or_ddm()) # depends on the ground types + + + See Also + ======== + + to_ddm + to_dfm + sympy.polys.matrices.domainmatrix.DomainMatrix.to_dfm_or_ddm + """ + return M.to_ddm().to_dfm_or_ddm() + + @classmethod + def zeros(cls, shape, domain): + r""" + + Returns a :py:class:`~.SDM` of size shape, + belonging to the specified domain + + In the example below we declare a matrix A where, + + .. math:: + A := \left[\begin{array}{ccc} + 0 & 0 & 0 \\ + 0 & 0 & 0 \end{array} \right] + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM.zeros((2, 3), QQ) + >>> A + {} + + """ + return cls({}, shape, domain) + + @classmethod + def ones(cls, shape, domain): + one = domain.one + m, n = shape + row = dict(zip(range(n), [one]*n)) + sdm = {i: row.copy() for i in range(m)} + return cls(sdm, shape, domain) + + @classmethod + def eye(cls, shape, domain): + """ + + Returns a identity :py:class:`~.SDM` matrix of dimensions + size x size, belonging to the specified domain + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> I = SDM.eye((2, 2), QQ) + >>> I + {0: {0: 1}, 1: {1: 1}} + + """ + if isinstance(shape, int): + rows, cols = shape, shape + else: + rows, cols = shape + one = domain.one + sdm = {i: {i: one} for i in range(min(rows, cols))} + return cls(sdm, (rows, cols), domain) + + @classmethod + def diag(cls, diagonal, domain, shape=None): + if shape is None: + shape = (len(diagonal), len(diagonal)) + sdm = {i: {i: v} for i, v in enumerate(diagonal) if v} + return cls(sdm, shape, domain) + + def transpose(M): + """ + + Returns the transpose of a :py:class:`~.SDM` matrix + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy import QQ + >>> A = SDM({0:{1:QQ(2)}, 1:{}}, (2, 2), QQ) + >>> A.transpose() + {1: {0: 2}} + + """ + MT = sdm_transpose(M) + return M.new(MT, M.shape[::-1], M.domain) + + def __add__(A, B): + if not isinstance(B, SDM): + return NotImplemented + elif A.shape != B.shape: + raise DMShapeError("Matrix size mismatch: %s + %s" % (A.shape, B.shape)) + return A.add(B) + + def __sub__(A, B): + if not isinstance(B, SDM): + return NotImplemented + elif A.shape != B.shape: + raise DMShapeError("Matrix size mismatch: %s - %s" % (A.shape, B.shape)) + return A.sub(B) + + def __neg__(A): + return A.neg() + + def __mul__(A, B): + """A * B""" + if isinstance(B, SDM): + return A.matmul(B) + elif B in A.domain: + return A.mul(B) + else: + return NotImplemented + + def __rmul__(a, b): + if b in a.domain: + return a.rmul(b) + else: + return NotImplemented + + def matmul(A, B): + """ + Performs matrix multiplication of two SDM matrices + + Parameters + ========== + + A, B: SDM to multiply + + Returns + ======= + + SDM + SDM after multiplication + + Raises + ====== + + DomainError + If domain of A does not match + with that of B + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> B = SDM({0:{0:ZZ(2), 1:ZZ(3)}, 1:{0:ZZ(4)}}, (2, 2), ZZ) + >>> A.matmul(B) + {0: {0: 8}, 1: {0: 2, 1: 3}} + + """ + if A.domain != B.domain: + raise DMDomainError + m, n = A.shape + n2, o = B.shape + if n != n2: + raise DMShapeError + C = sdm_matmul(A, B, A.domain, m, o) + return A.new(C, (m, o), A.domain) + + def mul(A, b): + """ + Multiplies each element of A with a scalar b + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> A.mul(ZZ(3)) + {0: {1: 6}, 1: {0: 3}} + + """ + Csdm = unop_dict(A, lambda aij: aij*b) + return A.new(Csdm, A.shape, A.domain) + + def rmul(A, b): + Csdm = unop_dict(A, lambda aij: b*aij) + return A.new(Csdm, A.shape, A.domain) + + def mul_elementwise(A, B): + if A.domain != B.domain: + raise DMDomainError + if A.shape != B.shape: + raise DMShapeError + zero = A.domain.zero + fzero = lambda e: zero + Csdm = binop_dict(A, B, mul, fzero, fzero) + return A.new(Csdm, A.shape, A.domain) + + def add(A, B): + """ + + Adds two :py:class:`~.SDM` matrices + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> B = SDM({0:{0: ZZ(3)}, 1:{1:ZZ(4)}}, (2, 2), ZZ) + >>> A.add(B) + {0: {0: 3, 1: 2}, 1: {0: 1, 1: 4}} + + """ + Csdm = binop_dict(A, B, add, pos, pos) + return A.new(Csdm, A.shape, A.domain) + + def sub(A, B): + """ + + Subtracts two :py:class:`~.SDM` matrices + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> B = SDM({0:{0: ZZ(3)}, 1:{1:ZZ(4)}}, (2, 2), ZZ) + >>> A.sub(B) + {0: {0: -3, 1: 2}, 1: {0: 1, 1: -4}} + + """ + Csdm = binop_dict(A, B, sub, pos, neg) + return A.new(Csdm, A.shape, A.domain) + + def neg(A): + """ + + Returns the negative of a :py:class:`~.SDM` matrix + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> A.neg() + {0: {1: -2}, 1: {0: -1}} + + """ + Csdm = unop_dict(A, neg) + return A.new(Csdm, A.shape, A.domain) + + def convert_to(A, K): + """ + Converts the :py:class:`~.Domain` of a :py:class:`~.SDM` matrix to K + + Examples + ======== + + >>> from sympy import ZZ, QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> A.convert_to(QQ) + {0: {1: 2}, 1: {0: 1}} + + """ + Kold = A.domain + if K == Kold: + return A.copy() + Ak = unop_dict(A, lambda e: K.convert_from(e, Kold)) + return A.new(Ak, A.shape, K) + + def nnz(A): + """Number of non-zero elements in the :py:class:`~.SDM` matrix. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{1: ZZ(2)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + >>> A.nnz() + 2 + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.nnz + """ + return sum(map(len, A.values())) + + def scc(A): + """Strongly connected components of a square matrix *A*. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0: ZZ(2)}, 1:{1:ZZ(1)}}, (2, 2), ZZ) + >>> A.scc() + [[0], [1]] + + See also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.scc + """ + rows, cols = A.shape + assert rows == cols + V = range(rows) + Emap = {v: list(A.get(v, [])) for v in V} + return _strongly_connected_components(V, Emap) + + def rref(A): + """ + + Returns reduced-row echelon form and list of pivots for the :py:class:`~.SDM` + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(2), 1:QQ(4)}}, (2, 2), QQ) + >>> A.rref() + ({0: {0: 1, 1: 2}}, [0]) + + """ + B, pivots, _ = sdm_irref(A) + return A.new(B, A.shape, A.domain), pivots + + def rref_den(A): + """ + + Returns reduced-row echelon form (RREF) with denominator and pivots. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(2), 1:QQ(4)}}, (2, 2), QQ) + >>> A.rref_den() + ({0: {0: 1, 1: 2}}, 1, [0]) + + """ + K = A.domain + A_rref_sdm, denom, pivots = sdm_rref_den(A, K) + A_rref = A.new(A_rref_sdm, A.shape, A.domain) + return A_rref, denom, pivots + + def inv(A): + """ + + Returns inverse of a matrix A + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + >>> A.inv() + {0: {0: -2, 1: 1}, 1: {0: 3/2, 1: -1/2}} + + """ + return A.to_dfm_or_ddm().inv().to_sdm() + + def det(A): + """ + Returns determinant of A + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + >>> A.det() + -2 + + """ + # It would be better to have a sparse implementation of det for use + # with very sparse matrices. Extremely sparse matrices probably just + # have determinant zero and we could probably detect that very quickly. + # In the meantime, we convert to a dense matrix and use ddm_idet. + # + # If GROUND_TYPES=flint though then we will use Flint's implementation + # if possible (dfm). + return A.to_dfm_or_ddm().det() + + def lu(A): + """ + + Returns LU decomposition for a matrix A + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + >>> A.lu() + ({0: {0: 1}, 1: {0: 3, 1: 1}}, {0: {0: 1, 1: 2}, 1: {1: -2}}, []) + + """ + L, U, swaps = A.to_ddm().lu() + return A.from_ddm(L), A.from_ddm(U), swaps + + def qr(self): + """ + QR decomposition for SDM (Sparse Domain Matrix). + + Returns: + - Q: Orthogonal matrix as a SDM. + - R: Upper triangular matrix as a SDM. + """ + ddm_q, ddm_r = self.to_ddm().qr() + Q = ddm_q.to_sdm() + R = ddm_r.to_sdm() + return Q, R + + def lu_solve(A, b): + """ + + Uses LU decomposition to solve Ax = b, + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + >>> b = SDM({0:{0:QQ(1)}, 1:{0:QQ(2)}}, (2, 1), QQ) + >>> A.lu_solve(b) + {1: {0: 1/2}} + + """ + return A.from_ddm(A.to_ddm().lu_solve(b.to_ddm())) + + def fflu(self): + """ + Fraction free LU decomposition of SDM. + + Uses DDM implementation. + + See Also + ======== + + sympy.polys.matrices.ddm.DDM.fflu + """ + ddm_p, ddm_l, ddm_d, ddm_u = self.to_dfm_or_ddm().fflu() + P = ddm_p.to_sdm() + L = ddm_l.to_sdm() + D = ddm_d.to_sdm() + U = ddm_u.to_sdm() + return P, L, D, U + + def nullspace(A): + """ + Nullspace of a :py:class:`~.SDM` matrix A. + + The domain of the matrix must be a field. + + It is better to use the :meth:`~.DomainMatrix.nullspace` method rather + than this method which is otherwise no longer used. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0: QQ(2), 1: QQ(4)}}, (2, 2), QQ) + >>> A.nullspace() + ({0: {0: -2, 1: 1}}, [1]) + + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.nullspace + The preferred way to get the nullspace of a matrix. + + """ + ncols = A.shape[1] + one = A.domain.one + B, pivots, nzcols = sdm_irref(A) + K, nonpivots = sdm_nullspace_from_rref(B, one, ncols, pivots, nzcols) + K = dict(enumerate(K)) + shape = (len(K), ncols) + return A.new(K, shape, A.domain), nonpivots + + def nullspace_from_rref(A, pivots=None): + """ + Returns nullspace for a :py:class:`~.SDM` matrix ``A`` in RREF. + + The domain of the matrix can be any domain. + + The matrix must already be in reduced row echelon form (RREF). + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import SDM + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0: QQ(2), 1: QQ(4)}}, (2, 2), QQ) + >>> A_rref, pivots = A.rref() + >>> A_null, nonpivots = A_rref.nullspace_from_rref(pivots) + >>> A_null + {0: {0: -2, 1: 1}} + >>> pivots + [0] + >>> nonpivots + [1] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.nullspace + The higher-level function that would usually be called instead of + calling this one directly. + + sympy.polys.matrices.domainmatrix.DomainMatrix.nullspace_from_rref + The higher-level direct equivalent of this function. + + sympy.polys.matrices.ddm.DDM.nullspace_from_rref + The equivalent function for dense :py:class:`~.DDM` matrices. + + """ + m, n = A.shape + K = A.domain + + if pivots is None: + pivots = sorted(map(min, A.values())) + + if not pivots: + return A.eye((n, n), K), list(range(n)) + elif len(pivots) == n: + return A.zeros((0, n), K), [] + + # In fraction-free RREF the nonzero entry inserted for the pivots is + # not necessarily 1. + pivot_val = A[0][pivots[0]] + assert not K.is_zero(pivot_val) + + pivots_set = set(pivots) + + # Loop once over all nonzero entries making a map from column indices + # to the nonzero entries in that column along with the row index of the + # nonzero entry. This is basically the transpose of the matrix. + nonzero_cols = defaultdict(list) + for i, Ai in A.items(): + for j, Aij in Ai.items(): + nonzero_cols[j].append((i, Aij)) + + # Usually in SDM we want to avoid looping over the dimensions of the + # matrix because it is optimised to support extremely sparse matrices. + # Here in nullspace though every zero column becomes a nonzero column + # so we need to loop once over the columns at least (range(n)) rather + # than just the nonzero entries of the matrix. We can still avoid + # an inner loop over the rows though by using the nonzero_cols map. + basis = [] + nonpivots = [] + for j in range(n): + if j in pivots_set: + continue + nonpivots.append(j) + + vec = {j: pivot_val} + for ip, Aij in nonzero_cols[j]: + vec[pivots[ip]] = -Aij + + basis.append(vec) + + sdm = dict(enumerate(basis)) + A_null = A.new(sdm, (len(basis), n), K) + + return (A_null, nonpivots) + + def particular(A): + ncols = A.shape[1] + B, pivots, nzcols = sdm_irref(A) + P = sdm_particular_from_rref(B, ncols, pivots) + rep = {0:P} if P else {} + return A.new(rep, (1, ncols-1), A.domain) + + def hstack(A, *B): + """Horizontally stacks :py:class:`~.SDM` matrices. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + + >>> A = SDM({0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}}, (2, 2), ZZ) + >>> B = SDM({0: {0: ZZ(5), 1: ZZ(6)}, 1: {0: ZZ(7), 1: ZZ(8)}}, (2, 2), ZZ) + >>> A.hstack(B) + {0: {0: 1, 1: 2, 2: 5, 3: 6}, 1: {0: 3, 1: 4, 2: 7, 3: 8}} + + >>> C = SDM({0: {0: ZZ(9), 1: ZZ(10)}, 1: {0: ZZ(11), 1: ZZ(12)}}, (2, 2), ZZ) + >>> A.hstack(B, C) + {0: {0: 1, 1: 2, 2: 5, 3: 6, 4: 9, 5: 10}, 1: {0: 3, 1: 4, 2: 7, 3: 8, 4: 11, 5: 12}} + """ + Anew = dict(A.copy()) + rows, cols = A.shape + domain = A.domain + + for Bk in B: + Bkrows, Bkcols = Bk.shape + assert Bkrows == rows + assert Bk.domain == domain + + for i, Bki in Bk.items(): + Ai = Anew.get(i, None) + if Ai is None: + Anew[i] = Ai = {} + for j, Bkij in Bki.items(): + Ai[j + cols] = Bkij + cols += Bkcols + + return A.new(Anew, (rows, cols), A.domain) + + def vstack(A, *B): + """Vertically stacks :py:class:`~.SDM` matrices. + + Examples + ======== + + >>> from sympy import ZZ + >>> from sympy.polys.matrices.sdm import SDM + + >>> A = SDM({0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}}, (2, 2), ZZ) + >>> B = SDM({0: {0: ZZ(5), 1: ZZ(6)}, 1: {0: ZZ(7), 1: ZZ(8)}}, (2, 2), ZZ) + >>> A.vstack(B) + {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}, 2: {0: 5, 1: 6}, 3: {0: 7, 1: 8}} + + >>> C = SDM({0: {0: ZZ(9), 1: ZZ(10)}, 1: {0: ZZ(11), 1: ZZ(12)}}, (2, 2), ZZ) + >>> A.vstack(B, C) + {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}, 2: {0: 5, 1: 6}, 3: {0: 7, 1: 8}, 4: {0: 9, 1: 10}, 5: {0: 11, 1: 12}} + """ + Anew = dict(A.copy()) + rows, cols = A.shape + domain = A.domain + + for Bk in B: + Bkrows, Bkcols = Bk.shape + assert Bkcols == cols + assert Bk.domain == domain + + for i, Bki in Bk.items(): + Anew[i + rows] = Bki + rows += Bkrows + + return A.new(Anew, (rows, cols), A.domain) + + def applyfunc(self, func, domain): + sdm = {i: {j: func(e) for j, e in row.items()} for i, row in self.items()} + return self.new(sdm, self.shape, domain) + + def charpoly(A): + """ + Returns the coefficients of the characteristic polynomial + of the :py:class:`~.SDM` matrix. These elements will be domain elements. + The domain of the elements will be same as domain of the :py:class:`~.SDM`. + + Examples + ======== + + >>> from sympy import QQ, Symbol + >>> from sympy.polys.matrices.sdm import SDM + >>> from sympy.polys import Poly + >>> A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + >>> A.charpoly() + [1, -5, -2] + + We can create a polynomial using the + coefficients using :py:class:`~.Poly` + + >>> x = Symbol('x') + >>> p = Poly(A.charpoly(), x, domain=A.domain) + >>> p + Poly(x**2 - 5*x - 2, x, domain='QQ') + + """ + K = A.domain + n, _ = A.shape + pdict = sdm_berk(A, n, K) + plist = [K.zero] * (n + 1) + for i, pi in pdict.items(): + plist[i] = pi + return plist + + def is_zero_matrix(self): + """ + Says whether this matrix has all zero entries. + """ + return not self + + def is_upper(self): + """ + Says whether this matrix is upper-triangular. True can be returned + even if the matrix is not square. + """ + return all(i <= j for i, row in self.items() for j in row) + + def is_lower(self): + """ + Says whether this matrix is lower-triangular. True can be returned + even if the matrix is not square. + """ + return all(i >= j for i, row in self.items() for j in row) + + def is_diagonal(self): + """ + Says whether this matrix is diagonal. True can be returned + even if the matrix is not square. + """ + return all(i == j for i, row in self.items() for j in row) + + def diagonal(self): + """ + Returns the diagonal of the matrix as a list. + """ + m, n = self.shape + zero = self.domain.zero + return [row.get(i, zero) for i, row in self.items() if i < n] + + def lll(A, delta=QQ(3, 4)): + """ + Returns the LLL-reduced basis for the :py:class:`~.SDM` matrix. + """ + return A.to_dfm_or_ddm().lll(delta=delta).to_sdm() + + def lll_transform(A, delta=QQ(3, 4)): + """ + Returns the LLL-reduced basis and transformation matrix. + """ + reduced, transform = A.to_dfm_or_ddm().lll_transform(delta=delta) + return reduced.to_sdm(), transform.to_sdm() + + +def binop_dict(A, B, fab, fa, fb): + Anz, Bnz = set(A), set(B) + C = {} + + for i in Anz & Bnz: + Ai, Bi = A[i], B[i] + Ci = {} + Anzi, Bnzi = set(Ai), set(Bi) + for j in Anzi & Bnzi: + Cij = fab(Ai[j], Bi[j]) + if Cij: + Ci[j] = Cij + for j in Anzi - Bnzi: + Cij = fa(Ai[j]) + if Cij: + Ci[j] = Cij + for j in Bnzi - Anzi: + Cij = fb(Bi[j]) + if Cij: + Ci[j] = Cij + if Ci: + C[i] = Ci + + for i in Anz - Bnz: + Ai = A[i] + Ci = {} + for j, Aij in Ai.items(): + Cij = fa(Aij) + if Cij: + Ci[j] = Cij + if Ci: + C[i] = Ci + + for i in Bnz - Anz: + Bi = B[i] + Ci = {} + for j, Bij in Bi.items(): + Cij = fb(Bij) + if Cij: + Ci[j] = Cij + if Ci: + C[i] = Ci + + return C + + +def unop_dict(A, f): + B = {} + for i, Ai in A.items(): + Bi = {} + for j, Aij in Ai.items(): + Bij = f(Aij) + if Bij: + Bi[j] = Bij + if Bi: + B[i] = Bi + return B + + +def sdm_transpose(M): + MT = {} + for i, Mi in M.items(): + for j, Mij in Mi.items(): + try: + MT[j][i] = Mij + except KeyError: + MT[j] = {i: Mij} + return MT + + +def sdm_dotvec(A, B, K): + return K.sum(A[j] * B[j] for j in A.keys() & B.keys()) + + +def sdm_matvecmul(A, B, K): + C = {} + for i, Ai in A.items(): + Ci = sdm_dotvec(Ai, B, K) + if Ci: + C[i] = Ci + return C + + +def sdm_matmul(A, B, K, m, o): + # + # Should be fast if A and B are very sparse. + # Consider e.g. A = B = eye(1000). + # + # The idea here is that we compute C = A*B in terms of the rows of C and + # B since the dict of dicts representation naturally stores the matrix as + # rows. The ith row of C (Ci) is equal to the sum of Aik * Bk where Bk is + # the kth row of B. The algorithm below loops over each nonzero element + # Aik of A and if the corresponding row Bj is nonzero then we do + # Ci += Aik * Bk. + # To make this more efficient we don't need to loop over all elements Aik. + # Instead for each row Ai we compute the intersection of the nonzero + # columns in Ai with the nonzero rows in B. That gives the k such that + # Aik and Bk are both nonzero. In Python the intersection of two sets + # of int can be computed very efficiently. + # + if K.is_EXRAW: + return sdm_matmul_exraw(A, B, K, m, o) + + C = {} + B_knz = set(B) + for i, Ai in A.items(): + Ci = {} + Ai_knz = set(Ai) + for k in Ai_knz & B_knz: + Aik = Ai[k] + for j, Bkj in B[k].items(): + Cij = Ci.get(j, None) + if Cij is not None: + Cij = Cij + Aik * Bkj + if Cij: + Ci[j] = Cij + else: + Ci.pop(j) + else: + Cij = Aik * Bkj + if Cij: + Ci[j] = Cij + if Ci: + C[i] = Ci + return C + + +def sdm_matmul_exraw(A, B, K, m, o): + # + # Like sdm_matmul above except that: + # + # - Handles cases like 0*oo -> nan (sdm_matmul skips multiplication by zero) + # - Uses K.sum (Add(*items)) for efficient addition of Expr + # + zero = K.zero + C = {} + B_knz = set(B) + for i, Ai in A.items(): + Ci_list = defaultdict(list) + Ai_knz = set(Ai) + + # Nonzero row/column pair + for k in Ai_knz & B_knz: + Aik = Ai[k] + if zero * Aik == zero: + # This is the main inner loop: + for j, Bkj in B[k].items(): + Ci_list[j].append(Aik * Bkj) + else: + for j in range(o): + Ci_list[j].append(Aik * B[k].get(j, zero)) + + # Zero row in B, check for infinities in A + for k in Ai_knz - B_knz: + zAik = zero * Ai[k] + if zAik != zero: + for j in range(o): + Ci_list[j].append(zAik) + + # Add terms using K.sum (Add(*terms)) for efficiency + Ci = {} + for j, Cij_list in Ci_list.items(): + Cij = K.sum(Cij_list) + if Cij: + Ci[j] = Cij + if Ci: + C[i] = Ci + + # Find all infinities in B + for k, Bk in B.items(): + for j, Bkj in Bk.items(): + if zero * Bkj != zero: + for i in range(m): + Aik = A.get(i, {}).get(k, zero) + # If Aik is not zero then this was handled above + if Aik == zero: + Ci = C.get(i, {}) + Cij = Ci.get(j, zero) + Aik * Bkj + if Cij != zero: + Ci[j] = Cij + C[i] = Ci + else: + Ci.pop(j, None) + if Ci: + C[i] = Ci + else: + C.pop(i, None) + + return C + + +def sdm_irref(A): + """RREF and pivots of a sparse matrix *A*. + + Compute the reduced row echelon form (RREF) of the matrix *A* and return a + list of the pivot columns. This routine does not work in place and leaves + the original matrix *A* unmodified. + + The domain of the matrix must be a field. + + Examples + ======== + + This routine works with a dict of dicts sparse representation of a matrix: + + >>> from sympy import QQ + >>> from sympy.polys.matrices.sdm import sdm_irref + >>> A = {0: {0: QQ(1), 1: QQ(2)}, 1: {0: QQ(3), 1: QQ(4)}} + >>> Arref, pivots, _ = sdm_irref(A) + >>> Arref + {0: {0: 1}, 1: {1: 1}} + >>> pivots + [0, 1] + + The analogous calculation with :py:class:`~.MutableDenseMatrix` would be + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2], [3, 4]]) + >>> Mrref, pivots = M.rref() + >>> Mrref + Matrix([ + [1, 0], + [0, 1]]) + >>> pivots + (0, 1) + + Notes + ===== + + The cost of this algorithm is determined purely by the nonzero elements of + the matrix. No part of the cost of any step in this algorithm depends on + the number of rows or columns in the matrix. No step depends even on the + number of nonzero rows apart from the primary loop over those rows. The + implementation is much faster than ddm_rref for sparse matrices. In fact + at the time of writing it is also (slightly) faster than the dense + implementation even if the input is a fully dense matrix so it seems to be + faster in all cases. + + The elements of the matrix should support exact division with ``/``. For + example elements of any domain that is a field (e.g. ``QQ``) should be + fine. No attempt is made to handle inexact arithmetic. + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref + The higher-level function that would normally be used to call this + routine. + sympy.polys.matrices.dense.ddm_irref + The dense equivalent of this routine. + sdm_rref_den + Fraction-free version of this routine. + """ + # + # Any zeros in the matrix are not stored at all so an element is zero if + # its row dict has no index at that key. A row is entirely zero if its + # row index is not in the outer dict. Since rref reorders the rows and + # removes zero rows we can completely discard the row indices. The first + # step then copies the row dicts into a list sorted by the index of the + # first nonzero column in each row. + # + # The algorithm then processes each row Ai one at a time. Previously seen + # rows are used to cancel their pivot columns from Ai. Then a pivot from + # Ai is chosen and is cancelled from all previously seen rows. At this + # point Ai joins the previously seen rows. Once all rows are seen all + # elimination has occurred and the rows are sorted by pivot column index. + # + # The previously seen rows are stored in two separate groups. The reduced + # group consists of all rows that have been reduced to a single nonzero + # element (the pivot). There is no need to attempt any further reduction + # with these. Rows that still have other nonzeros need to be considered + # when Ai is cancelled from the previously seen rows. + # + # A dict nonzerocolumns is used to map from a column index to a set of + # previously seen rows that still have a nonzero element in that column. + # This means that we can cancel the pivot from Ai into the previously seen + # rows without needing to loop over each row that might have a zero in + # that column. + # + + # Row dicts sorted by index of first nonzero column + # (Maybe sorting is not needed/useful.) + Arows = sorted((Ai.copy() for Ai in A.values()), key=min) + + # Each processed row has an associated pivot column. + # pivot_row_map maps from the pivot column index to the row dict. + # This means that we can represent a set of rows purely as a set of their + # pivot indices. + pivot_row_map = {} + + # Set of pivot indices for rows that are fully reduced to a single nonzero. + reduced_pivots = set() + + # Set of pivot indices for rows not fully reduced + nonreduced_pivots = set() + + # Map from column index to a set of pivot indices representing the rows + # that have a nonzero at that column. + nonzero_columns = defaultdict(set) + + while Arows: + # Select pivot element and row + Ai = Arows.pop() + + # Nonzero columns from fully reduced pivot rows can be removed + Ai = {j: Aij for j, Aij in Ai.items() if j not in reduced_pivots} + + # Others require full row cancellation + for j in nonreduced_pivots & set(Ai): + Aj = pivot_row_map[j] + Aij = Ai[j] + Ainz = set(Ai) + Ajnz = set(Aj) + for k in Ajnz - Ainz: + Ai[k] = - Aij * Aj[k] + Ai.pop(j) + Ainz.remove(j) + for k in Ajnz & Ainz: + Aik = Ai[k] - Aij * Aj[k] + if Aik: + Ai[k] = Aik + else: + Ai.pop(k) + + # We have now cancelled previously seen pivots from Ai. + # If it is zero then discard it. + if not Ai: + continue + + # Choose a pivot from Ai: + j = min(Ai) + Aij = Ai[j] + pivot_row_map[j] = Ai + Ainz = set(Ai) + + # Normalise the pivot row to make the pivot 1. + # + # This approach is slow for some domains. Cross cancellation might be + # better for e.g. QQ(x) with division delayed to the final steps. + Aijinv = Aij**-1 + for l in Ai: + Ai[l] *= Aijinv + + # Use Aij to cancel column j from all previously seen rows + for k in nonzero_columns.pop(j, ()): + Ak = pivot_row_map[k] + Akj = Ak[j] + Aknz = set(Ak) + for l in Ainz - Aknz: + Ak[l] = - Akj * Ai[l] + nonzero_columns[l].add(k) + Ak.pop(j) + Aknz.remove(j) + for l in Ainz & Aknz: + Akl = Ak[l] - Akj * Ai[l] + if Akl: + Ak[l] = Akl + else: + # Drop nonzero elements + Ak.pop(l) + if l != j: + nonzero_columns[l].remove(k) + if len(Ak) == 1: + reduced_pivots.add(k) + nonreduced_pivots.remove(k) + + if len(Ai) == 1: + reduced_pivots.add(j) + else: + nonreduced_pivots.add(j) + for l in Ai: + if l != j: + nonzero_columns[l].add(j) + + # All done! + pivots = sorted(reduced_pivots | nonreduced_pivots) + pivot2row = {p: n for n, p in enumerate(pivots)} + nonzero_columns = {c: {pivot2row[p] for p in s} for c, s in nonzero_columns.items()} + rows = [pivot_row_map[i] for i in pivots] + rref = dict(enumerate(rows)) + return rref, pivots, nonzero_columns + + +def sdm_rref_den(A, K): + """ + Return the reduced row echelon form (RREF) of A with denominator. + + The RREF is computed using fraction-free Gauss-Jordan elimination. + + Explanation + =========== + + The algorithm used is the fraction-free version of Gauss-Jordan elimination + described as FFGJ in [1]_. Here it is modified to handle zero or missing + pivots and to avoid redundant arithmetic. This implementation is also + optimized for sparse matrices. + + The domain $K$ must support exact division (``K.exquo``) but does not need + to be a field. This method is suitable for most exact rings and fields like + :ref:`ZZ`, :ref:`QQ` and :ref:`QQ(a)`. In the case of :ref:`QQ` or + :ref:`K(x)` it might be more efficient to clear denominators and use + :ref:`ZZ` or :ref:`K[x]` instead. + + For inexact domains like :ref:`RR` and :ref:`CC` use ``ddm_irref`` instead. + + Examples + ======== + + >>> from sympy.polys.matrices.sdm import sdm_rref_den + >>> from sympy.polys.domains import ZZ + >>> A = {0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}} + >>> A_rref, den, pivots = sdm_rref_den(A, ZZ) + >>> A_rref + {0: {0: -2}, 1: {1: -2}} + >>> den + -2 + >>> pivots + [0, 1] + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.rref_den + Higher-level interface to ``sdm_rref_den`` that would usually be used + instead of calling this function directly. + sympy.polys.matrices.sdm.sdm_rref_den + The ``SDM`` method that uses this function. + sdm_irref + Computes RREF using field division. + ddm_irref_den + The dense version of this algorithm. + + References + ========== + + .. [1] Fraction-free algorithms for linear and polynomial equations. + George C. Nakos , Peter R. Turner , Robert M. Williams. + https://dl.acm.org/doi/10.1145/271130.271133 + """ + # + # We represent each row of the matrix as a dict mapping column indices to + # nonzero elements. We will build the RREF matrix starting from an empty + # matrix and appending one row at a time. At each step we will have the + # RREF of the rows we have processed so far. + # + # Our representation of the RREF divides it into three parts: + # + # 1. Fully reduced rows having only a single nonzero element (the pivot). + # 2. Partially reduced rows having nonzeros after the pivot. + # 3. The current denominator and divisor. + # + # For example if the incremental RREF might be: + # + # [2, 0, 0, 0, 0, 0, 0, 0, 0, 0] + # [0, 0, 2, 0, 0, 0, 7, 0, 0, 0] + # [0, 0, 0, 0, 0, 2, 0, 0, 0, 0] + # [0, 0, 0, 0, 0, 0, 0, 2, 0, 0] + # [0, 0, 0, 0, 0, 0, 0, 0, 2, 0] + # + # Here the second row is partially reduced and the other rows are fully + # reduced. The denominator would be 2 in this case. We distinguish the + # fully reduced rows because we can handle them more efficiently when + # adding a new row. + # + # When adding a new row we need to multiply it by the current denominator. + # Then we reduce the new row by cross cancellation with the previous rows. + # Then if it is not reduced to zero we take its leading entry as the new + # pivot, cross cancel the new row from the previous rows and update the + # denominator. In the fraction-free version this last step requires + # multiplying and dividing the whole matrix by the new pivot and the + # current divisor. The advantage of building the RREF one row at a time is + # that in the sparse case we only need to work with the relatively sparse + # upper rows of the matrix. The simple version of FFGJ in [1] would + # multiply and divide all the dense lower rows at each step. + + # Handle the trivial cases. + if not A: + return ({}, K.one, []) + elif len(A) == 1: + Ai, = A.values() + j = min(Ai) + Aij = Ai[j] + return ({0: Ai.copy()}, Aij, [j]) + + # For inexact domains like RR[x] we use quo and discard the remainder. + # Maybe it would be better for K.exquo to do this automatically. + if K.is_Exact: + exquo = K.exquo + else: + exquo = K.quo + + # Make sure we have the rows in order to make this deterministic from the + # outset. + _, rows_in_order = zip(*sorted(A.items())) + + col_to_row_reduced = {} + col_to_row_unreduced = {} + reduced = col_to_row_reduced.keys() + unreduced = col_to_row_unreduced.keys() + + # Our representation of the RREF so far. + A_rref_rows = [] + denom = None + divisor = None + + # The rows that remain to be added to the RREF. These are sorted by the + # column index of their leading entry. Note that sorted() is stable so the + # previous sort by unique row index is still needed to make this + # deterministic (there may be multiple rows with the same leading column). + A_rows = sorted(rows_in_order, key=min) + + for Ai in A_rows: + + # All fully reduced columns can be immediately discarded. + Ai = {j: Aij for j, Aij in Ai.items() if j not in reduced} + + # We need to multiply the new row by the current denominator to bring + # it into the same scale as the previous rows and then cross-cancel to + # reduce it wrt the previous unreduced rows. All pivots in the previous + # rows are equal to denom so the coefficients we need to make a linear + # combination of the previous rows to cancel into the new row are just + # the ones that are already in the new row *before* we multiply by + # denom. We compute that linear combination first and then multiply the + # new row by denom before subtraction. + Ai_cancel = {} + + for j in unreduced & Ai.keys(): + # Remove the pivot column from the new row since it would become + # zero anyway. + Aij = Ai.pop(j) + + Aj = A_rref_rows[col_to_row_unreduced[j]] + + for k, Ajk in Aj.items(): + Aik_cancel = Ai_cancel.get(k) + if Aik_cancel is None: + Ai_cancel[k] = Aij * Ajk + else: + Aik_cancel = Aik_cancel + Aij * Ajk + if Aik_cancel: + Ai_cancel[k] = Aik_cancel + else: + Ai_cancel.pop(k) + + # Multiply the new row by the current denominator and subtract. + Ai_nz = set(Ai) + Ai_cancel_nz = set(Ai_cancel) + + d = denom or K.one + + for k in Ai_cancel_nz - Ai_nz: + Ai[k] = -Ai_cancel[k] + + for k in Ai_nz - Ai_cancel_nz: + Ai[k] = Ai[k] * d + + for k in Ai_cancel_nz & Ai_nz: + Aik = Ai[k] * d - Ai_cancel[k] + if Aik: + Ai[k] = Aik + else: + Ai.pop(k) + + # Now Ai has the same scale as the other rows and is reduced wrt the + # unreduced rows. + + # If the row is reduced to zero then discard it. + if not Ai: + continue + + # Choose a pivot for this row. + j = min(Ai) + Aij = Ai.pop(j) + + # Cross cancel the unreduced rows by the new row. + # a[k][l] = (a[i][j]*a[k][l] - a[k][j]*a[i][l]) / divisor + for pk, k in list(col_to_row_unreduced.items()): + + Ak = A_rref_rows[k] + + if j not in Ak: + # This row is already reduced wrt the new row but we need to + # bring it to the same scale as the new denominator. This step + # is not needed in sdm_irref. + for l, Akl in Ak.items(): + Akl = Akl * Aij + if divisor is not None: + Akl = exquo(Akl, divisor) + Ak[l] = Akl + continue + + Akj = Ak.pop(j) + Ai_nz = set(Ai) + Ak_nz = set(Ak) + + for l in Ai_nz - Ak_nz: + Ak[l] = - Akj * Ai[l] + if divisor is not None: + Ak[l] = exquo(Ak[l], divisor) + + # This loop also not needed in sdm_irref. + for l in Ak_nz - Ai_nz: + Ak[l] = Aij * Ak[l] + if divisor is not None: + Ak[l] = exquo(Ak[l], divisor) + + for l in Ai_nz & Ak_nz: + Akl = Aij * Ak[l] - Akj * Ai[l] + if Akl: + if divisor is not None: + Akl = exquo(Akl, divisor) + Ak[l] = Akl + else: + Ak.pop(l) + + if not Ak: + col_to_row_unreduced.pop(pk) + col_to_row_reduced[pk] = k + + i = len(A_rref_rows) + A_rref_rows.append(Ai) + if Ai: + col_to_row_unreduced[j] = i + else: + col_to_row_reduced[j] = i + + # Update the denominator. + if not K.is_one(Aij): + if denom is None: + denom = Aij + else: + denom *= Aij + + if divisor is not None: + denom = exquo(denom, divisor) + + # Update the divisor. + divisor = denom + + if denom is None: + denom = K.one + + # Sort the rows by their leading column index. + col_to_row = {**col_to_row_reduced, **col_to_row_unreduced} + row_to_col = {i: j for j, i in col_to_row.items()} + A_rref_rows_col = [(row_to_col[i], Ai) for i, Ai in enumerate(A_rref_rows)] + pivots, A_rref = zip(*sorted(A_rref_rows_col)) + pivots = list(pivots) + + # Insert the pivot values + for i, Ai in enumerate(A_rref): + Ai[pivots[i]] = denom + + A_rref_sdm = dict(enumerate(A_rref)) + + return A_rref_sdm, denom, pivots + + +def sdm_nullspace_from_rref(A, one, ncols, pivots, nonzero_cols): + """Get nullspace from A which is in RREF""" + nonpivots = sorted(set(range(ncols)) - set(pivots)) + + K = [] + for j in nonpivots: + Kj = {j:one} + for i in nonzero_cols.get(j, ()): + Kj[pivots[i]] = -A[i][j] + K.append(Kj) + + return K, nonpivots + + +def sdm_particular_from_rref(A, ncols, pivots): + """Get a particular solution from A which is in RREF""" + P = {} + for i, j in enumerate(pivots): + Ain = A[i].get(ncols-1, None) + if Ain is not None: + P[j] = Ain / A[i][j] + return P + + +def sdm_berk(M, n, K): + """ + Berkowitz algorithm for computing the characteristic polynomial. + + Explanation + =========== + + The Berkowitz algorithm is a division-free algorithm for computing the + characteristic polynomial of a matrix over any commutative ring using only + arithmetic in the coefficient ring. This implementation is for sparse + matrices represented in a dict-of-dicts format (like :class:`SDM`). + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.polys.matrices.sdm import sdm_berk + >>> from sympy.polys.domains import ZZ + >>> M = {0: {0: ZZ(1), 1:ZZ(2)}, 1: {0:ZZ(3), 1:ZZ(4)}} + >>> sdm_berk(M, 2, ZZ) + {0: 1, 1: -5, 2: -2} + >>> Matrix([[1, 2], [3, 4]]).charpoly() + PurePoly(lambda**2 - 5*lambda - 2, lambda, domain='ZZ') + + See Also + ======== + + sympy.polys.matrices.domainmatrix.DomainMatrix.charpoly + The high-level interface to this function. + sympy.polys.matrices.dense.ddm_berk + The dense version of this function. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Samuelson%E2%80%93Berkowitz_algorithm + """ + zero = K.zero + one = K.one + + if n == 0: + return {0: one} + elif n == 1: + pdict = {0: one} + if M00 := M.get(0, {}).get(0, zero): + pdict[1] = -M00 + + # M = [[a, R], + # [C, A]] + a, R, C, A = K.zero, {}, {}, defaultdict(dict) + for i, Mi in M.items(): + for j, Mij in Mi.items(): + if i and j: + A[i-1][j-1] = Mij + elif i: + C[i-1] = Mij + elif j: + R[j-1] = Mij + else: + a = Mij + + # T = [ 1, 0, 0, 0, 0, ... ] + # [ -a, 1, 0, 0, 0, ... ] + # [ -R*C, -a, 1, 0, 0, ... ] + # [ -R*A*C, -R*C, -a, 1, 0, ... ] + # [-R*A^2*C, -R*A*C, -R*C, -a, 1, ... ] + # [ ... ] + # T is (n+1) x n + # + # In the sparse case we might have A^m*C = 0 for some m making T banded + # rather than triangular so we just compute the nonzero entries of the + # first column rather than constructing the matrix explicitly. + + AnC = C + RC = sdm_dotvec(R, C, K) + + Tvals = [one, -a, -RC] + for i in range(3, n+1): + AnC = sdm_matvecmul(A, AnC, K) + if not AnC: + break + RAnC = sdm_dotvec(R, AnC, K) + Tvals.append(-RAnC) + + # Strip trailing zeros + while Tvals and not Tvals[-1]: + Tvals.pop() + + q = sdm_berk(A, n-1, K) + + # This would be the explicit multiplication T*q but we can do better: + # + # T = {} + # for i in range(n+1): + # Ti = {} + # for j in range(max(0, i-len(Tvals)+1), min(i+1, n)): + # Ti[j] = Tvals[i-j] + # T[i] = Ti + # Tq = sdm_matvecmul(T, q, K) + # + # In the sparse case q might be mostly zero. We know that T[i,j] is nonzero + # for i <= j < i + len(Tvals) so if q does not have a nonzero entry in that + # range then Tq[j] must be zero. We exploit this potential banded + # structure and the potential sparsity of q to compute Tq more efficiently. + + Tvals = Tvals[::-1] + + Tq = {} + + for i in range(min(q), min(max(q)+len(Tvals), n+1)): + Ti = dict(enumerate(Tvals, i-len(Tvals)+1)) + if Tqi := sdm_dotvec(Ti, q, K): + Tq[i] = Tqi + + return Tq diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_ddm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_ddm.py new file mode 100644 index 0000000000000000000000000000000000000000..44c862461e85d503696e621874c10d67d8ee1f1d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_ddm.py @@ -0,0 +1,558 @@ +from sympy.testing.pytest import raises +from sympy.external.gmpy import GROUND_TYPES + +from sympy.polys import ZZ, QQ + +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.exceptions import ( + DMShapeError, DMNonInvertibleMatrixError, DMDomainError, + DMBadInputError) + + +def test_DDM_init(): + items = [[ZZ(0), ZZ(1), ZZ(2)], [ZZ(3), ZZ(4), ZZ(5)]] + shape = (2, 3) + ddm = DDM(items, shape, ZZ) + assert ddm.shape == shape + assert ddm.rows == 2 + assert ddm.cols == 3 + assert ddm.domain == ZZ + + raises(DMBadInputError, lambda: DDM([[ZZ(2), ZZ(3)]], (2, 2), ZZ)) + raises(DMBadInputError, lambda: DDM([[ZZ(1)], [ZZ(2), ZZ(3)]], (2, 2), ZZ)) + + +def test_DDM_getsetitem(): + ddm = DDM([[ZZ(2), ZZ(3)], [ZZ(4), ZZ(5)]], (2, 2), ZZ) + + assert ddm[0][0] == ZZ(2) + assert ddm[0][1] == ZZ(3) + assert ddm[1][0] == ZZ(4) + assert ddm[1][1] == ZZ(5) + + raises(IndexError, lambda: ddm[2][0]) + raises(IndexError, lambda: ddm[0][2]) + + ddm[0][0] = ZZ(-1) + assert ddm[0][0] == ZZ(-1) + + +def test_DDM_str(): + ddm = DDM([[ZZ(0), ZZ(1)], [ZZ(2), ZZ(3)]], (2, 2), ZZ) + if GROUND_TYPES == 'gmpy': # pragma: no cover + assert str(ddm) == '[[0, 1], [2, 3]]' + assert repr(ddm) == 'DDM([[mpz(0), mpz(1)], [mpz(2), mpz(3)]], (2, 2), ZZ)' + else: # pragma: no cover + assert repr(ddm) == 'DDM([[0, 1], [2, 3]], (2, 2), ZZ)' + assert str(ddm) == '[[0, 1], [2, 3]]' + + +def test_DDM_eq(): + items = [[ZZ(0), ZZ(1)], [ZZ(2), ZZ(3)]] + ddm1 = DDM(items, (2, 2), ZZ) + ddm2 = DDM(items, (2, 2), ZZ) + + assert (ddm1 == ddm1) is True + assert (ddm1 == items) is False + assert (items == ddm1) is False + assert (ddm1 == ddm2) is True + assert (ddm2 == ddm1) is True + + assert (ddm1 != ddm1) is False + assert (ddm1 != items) is True + assert (items != ddm1) is True + assert (ddm1 != ddm2) is False + assert (ddm2 != ddm1) is False + + ddm3 = DDM([[ZZ(0), ZZ(1)], [ZZ(3), ZZ(3)]], (2, 2), ZZ) + ddm3 = DDM(items, (2, 2), QQ) + + assert (ddm1 == ddm3) is False + assert (ddm3 == ddm1) is False + assert (ddm1 != ddm3) is True + assert (ddm3 != ddm1) is True + + +def test_DDM_convert_to(): + ddm = DDM([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + assert ddm.convert_to(ZZ) == ddm + ddmq = ddm.convert_to(QQ) + assert ddmq.domain == QQ + + +def test_DDM_zeros(): + ddmz = DDM.zeros((3, 4), QQ) + assert list(ddmz) == [[QQ(0)] * 4] * 3 + assert ddmz.shape == (3, 4) + assert ddmz.domain == QQ + +def test_DDM_ones(): + ddmone = DDM.ones((2, 3), QQ) + assert list(ddmone) == [[QQ(1)] * 3] * 2 + assert ddmone.shape == (2, 3) + assert ddmone.domain == QQ + +def test_DDM_eye(): + ddmz = DDM.eye(3, QQ) + f = lambda i, j: QQ(1) if i == j else QQ(0) + assert list(ddmz) == [[f(i, j) for i in range(3)] for j in range(3)] + assert ddmz.shape == (3, 3) + assert ddmz.domain == QQ + + +def test_DDM_copy(): + ddm1 = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + ddm2 = ddm1.copy() + assert (ddm1 == ddm2) is True + ddm1[0][0] = QQ(-1) + assert (ddm1 == ddm2) is False + ddm2[0][0] = QQ(-1) + assert (ddm1 == ddm2) is True + + +def test_DDM_transpose(): + ddm = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + ddmT = DDM([[QQ(1), QQ(2)]], (1, 2), QQ) + assert ddm.transpose() == ddmT + ddm02 = DDM([], (0, 2), QQ) + ddm02T = DDM([[], []], (2, 0), QQ) + assert ddm02.transpose() == ddm02T + assert ddm02T.transpose() == ddm02 + ddm0 = DDM([], (0, 0), QQ) + assert ddm0.transpose() == ddm0 + + +def test_DDM_add(): + A = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + B = DDM([[ZZ(3)], [ZZ(4)]], (2, 1), ZZ) + C = DDM([[ZZ(4)], [ZZ(6)]], (2, 1), ZZ) + AQ = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + assert A + B == A.add(B) == C + + raises(DMShapeError, lambda: A + DDM([[ZZ(5)]], (1, 1), ZZ)) + raises(TypeError, lambda: A + ZZ(1)) + raises(TypeError, lambda: ZZ(1) + A) + raises(DMDomainError, lambda: A + AQ) + raises(DMDomainError, lambda: AQ + A) + + +def test_DDM_sub(): + A = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + B = DDM([[ZZ(3)], [ZZ(4)]], (2, 1), ZZ) + C = DDM([[ZZ(-2)], [ZZ(-2)]], (2, 1), ZZ) + AQ = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + D = DDM([[ZZ(5)]], (1, 1), ZZ) + assert A - B == A.sub(B) == C + + raises(TypeError, lambda: A - ZZ(1)) + raises(TypeError, lambda: ZZ(1) - A) + raises(DMShapeError, lambda: A - D) + raises(DMShapeError, lambda: D - A) + raises(DMShapeError, lambda: A.sub(D)) + raises(DMShapeError, lambda: D.sub(A)) + raises(DMDomainError, lambda: A - AQ) + raises(DMDomainError, lambda: AQ - A) + raises(DMDomainError, lambda: A.sub(AQ)) + raises(DMDomainError, lambda: AQ.sub(A)) + + +def test_DDM_neg(): + A = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + An = DDM([[ZZ(-1)], [ZZ(-2)]], (2, 1), ZZ) + assert -A == A.neg() == An + assert -An == An.neg() == A + + +def test_DDM_mul(): + A = DDM([[ZZ(1)]], (1, 1), ZZ) + A2 = DDM([[ZZ(2)]], (1, 1), ZZ) + assert A * ZZ(2) == A2 + assert ZZ(2) * A == A2 + raises(TypeError, lambda: [[1]] * A) + raises(TypeError, lambda: A * [[1]]) + + +def test_DDM_matmul(): + A = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + B = DDM([[ZZ(3), ZZ(4)]], (1, 2), ZZ) + AB = DDM([[ZZ(3), ZZ(4)], [ZZ(6), ZZ(8)]], (2, 2), ZZ) + BA = DDM([[ZZ(11)]], (1, 1), ZZ) + + assert A @ B == A.matmul(B) == AB + assert B @ A == B.matmul(A) == BA + + raises(TypeError, lambda: A @ 1) + raises(TypeError, lambda: A @ [[3, 4]]) + + Bq = DDM([[QQ(3), QQ(4)]], (1, 2), QQ) + + raises(DMDomainError, lambda: A @ Bq) + raises(DMDomainError, lambda: Bq @ A) + + C = DDM([[ZZ(1)]], (1, 1), ZZ) + + assert A @ C == A.matmul(C) == A + + raises(DMShapeError, lambda: C @ A) + raises(DMShapeError, lambda: C.matmul(A)) + + Z04 = DDM([], (0, 4), ZZ) + Z40 = DDM([[]]*4, (4, 0), ZZ) + Z50 = DDM([[]]*5, (5, 0), ZZ) + Z05 = DDM([], (0, 5), ZZ) + Z45 = DDM([[0] * 5] * 4, (4, 5), ZZ) + Z54 = DDM([[0] * 4] * 5, (5, 4), ZZ) + Z00 = DDM([], (0, 0), ZZ) + + assert Z04 @ Z45 == Z04.matmul(Z45) == Z05 + assert Z45 @ Z50 == Z45.matmul(Z50) == Z40 + assert Z00 @ Z04 == Z00.matmul(Z04) == Z04 + assert Z50 @ Z00 == Z50.matmul(Z00) == Z50 + assert Z00 @ Z00 == Z00.matmul(Z00) == Z00 + assert Z50 @ Z04 == Z50.matmul(Z04) == Z54 + + raises(DMShapeError, lambda: Z05 @ Z40) + raises(DMShapeError, lambda: Z05.matmul(Z40)) + + +def test_DDM_hstack(): + A = DDM([[ZZ(1), ZZ(2), ZZ(3)]], (1, 3), ZZ) + B = DDM([[ZZ(4), ZZ(5)]], (1, 2), ZZ) + C = DDM([[ZZ(6)]], (1, 1), ZZ) + + Ah = A.hstack(B) + assert Ah.shape == (1, 5) + assert Ah.domain == ZZ + assert Ah == DDM([[ZZ(1), ZZ(2), ZZ(3), ZZ(4), ZZ(5)]], (1, 5), ZZ) + + Ah = A.hstack(B, C) + assert Ah.shape == (1, 6) + assert Ah.domain == ZZ + assert Ah == DDM([[ZZ(1), ZZ(2), ZZ(3), ZZ(4), ZZ(5), ZZ(6)]], (1, 6), ZZ) + + +def test_DDM_vstack(): + A = DDM([[ZZ(1)], [ZZ(2)], [ZZ(3)]], (3, 1), ZZ) + B = DDM([[ZZ(4)], [ZZ(5)]], (2, 1), ZZ) + C = DDM([[ZZ(6)]], (1, 1), ZZ) + + Ah = A.vstack(B) + assert Ah.shape == (5, 1) + assert Ah.domain == ZZ + assert Ah == DDM([[ZZ(1)], [ZZ(2)], [ZZ(3)], [ZZ(4)], [ZZ(5)]], (5, 1), ZZ) + + Ah = A.vstack(B, C) + assert Ah.shape == (6, 1) + assert Ah.domain == ZZ + assert Ah == DDM([[ZZ(1)], [ZZ(2)], [ZZ(3)], [ZZ(4)], [ZZ(5)], [ZZ(6)]], (6, 1), ZZ) + + +def test_DDM_applyfunc(): + A = DDM([[ZZ(1), ZZ(2), ZZ(3)]], (1, 3), ZZ) + B = DDM([[ZZ(2), ZZ(4), ZZ(6)]], (1, 3), ZZ) + assert A.applyfunc(lambda x: 2*x, ZZ) == B + +def test_DDM_rref(): + + A = DDM([], (0, 4), QQ) + assert A.rref() == (A, []) + + A = DDM([[QQ(0), QQ(1)], [QQ(1), QQ(1)]], (2, 2), QQ) + Ar = DDM([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + pivots = [0, 1] + assert A.rref() == (Ar, pivots) + + A = DDM([[QQ(1), QQ(2), QQ(1)], [QQ(3), QQ(4), QQ(1)]], (2, 3), QQ) + Ar = DDM([[QQ(1), QQ(0), QQ(-1)], [QQ(0), QQ(1), QQ(1)]], (2, 3), QQ) + pivots = [0, 1] + assert A.rref() == (Ar, pivots) + + A = DDM([[QQ(3), QQ(4), QQ(1)], [QQ(1), QQ(2), QQ(1)]], (2, 3), QQ) + Ar = DDM([[QQ(1), QQ(0), QQ(-1)], [QQ(0), QQ(1), QQ(1)]], (2, 3), QQ) + pivots = [0, 1] + assert A.rref() == (Ar, pivots) + + A = DDM([[QQ(1), QQ(0)], [QQ(1), QQ(3)], [QQ(0), QQ(1)]], (3, 2), QQ) + Ar = DDM([[QQ(1), QQ(0)], [QQ(0), QQ(1)], [QQ(0), QQ(0)]], (3, 2), QQ) + pivots = [0, 1] + assert A.rref() == (Ar, pivots) + + A = DDM([[QQ(1), QQ(0), QQ(1)], [QQ(3), QQ(0), QQ(1)]], (2, 3), QQ) + Ar = DDM([[QQ(1), QQ(0), QQ(0)], [QQ(0), QQ(0), QQ(1)]], (2, 3), QQ) + pivots = [0, 2] + assert A.rref() == (Ar, pivots) + + +def test_DDM_nullspace(): + # more tests are in test_nullspace.py + A = DDM([[QQ(1), QQ(1)], [QQ(1), QQ(1)]], (2, 2), QQ) + Anull = DDM([[QQ(-1), QQ(1)]], (1, 2), QQ) + nonpivots = [1] + assert A.nullspace() == (Anull, nonpivots) + + +def test_DDM_particular(): + A = DDM([[QQ(1), QQ(0)]], (1, 2), QQ) + assert A.particular() == DDM.zeros((1, 1), QQ) + + +def test_DDM_det(): + # 0x0 case + A = DDM([], (0, 0), ZZ) + assert A.det() == ZZ(1) + + # 1x1 case + A = DDM([[ZZ(2)]], (1, 1), ZZ) + assert A.det() == ZZ(2) + + # 2x2 case + A = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.det() == ZZ(-2) + + # 3x3 with swap + A = DDM([[ZZ(1), ZZ(2), ZZ(3)], [ZZ(1), ZZ(2), ZZ(4)], [ZZ(1), ZZ(2), ZZ(5)]], (3, 3), ZZ) + assert A.det() == ZZ(0) + + # 2x2 QQ case + A = DDM([[QQ(1, 2), QQ(1, 2)], [QQ(1, 3), QQ(1, 4)]], (2, 2), QQ) + assert A.det() == QQ(-1, 24) + + # Nonsquare error + A = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMShapeError, lambda: A.det()) + + # Nonsquare error with empty matrix + A = DDM([], (0, 1), ZZ) + raises(DMShapeError, lambda: A.det()) + + +def test_DDM_inv(): + A = DDM([[QQ(1, 1), QQ(2, 1)], [QQ(3, 1), QQ(4, 1)]], (2, 2), QQ) + Ainv = DDM([[QQ(-2, 1), QQ(1, 1)], [QQ(3, 2), QQ(-1, 2)]], (2, 2), QQ) + assert A.inv() == Ainv + + A = DDM([[QQ(1), QQ(2)]], (1, 2), QQ) + raises(DMShapeError, lambda: A.inv()) + + A = DDM([[ZZ(2)]], (1, 1), ZZ) + raises(DMDomainError, lambda: A.inv()) + + A = DDM([], (0, 0), QQ) + assert A.inv() == A + + A = DDM([[QQ(1), QQ(2)], [QQ(2), QQ(4)]], (2, 2), QQ) + raises(DMNonInvertibleMatrixError, lambda: A.inv()) + + +def test_DDM_lu(): + A = DDM([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + L, U, swaps = A.lu() + assert L == DDM([[QQ(1), QQ(0)], [QQ(3), QQ(1)]], (2, 2), QQ) + assert U == DDM([[QQ(1), QQ(2)], [QQ(0), QQ(-2)]], (2, 2), QQ) + assert swaps == [] + + A = [[1, 0, 0, 0], [0, 0, 0, 0], [0, 0, 1, 1], [0, 0, 1, 2]] + Lexp = [[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 1, 1]] + Uexp = [[1, 0, 0, 0], [0, 0, 0, 0], [0, 0, 1, 1], [0, 0, 0, 1]] + to_dom = lambda rows, dom: [[dom(e) for e in row] for row in rows] + A = DDM(to_dom(A, QQ), (4, 4), QQ) + Lexp = DDM(to_dom(Lexp, QQ), (4, 4), QQ) + Uexp = DDM(to_dom(Uexp, QQ), (4, 4), QQ) + L, U, swaps = A.lu() + assert L == Lexp + assert U == Uexp + assert swaps == [] + + +def test_DDM_lu_solve(): + # Basic example + A = DDM([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + b = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + x = DDM([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + assert A.lu_solve(b) == x + + # Example with swaps + A = DDM([[QQ(0), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + assert A.lu_solve(b) == x + + # Overdetermined, consistent + A = DDM([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]], (3, 2), QQ) + b = DDM([[QQ(1)], [QQ(2)], [QQ(3)]], (3, 1), QQ) + assert A.lu_solve(b) == x + + # Overdetermined, inconsistent + b = DDM([[QQ(1)], [QQ(2)], [QQ(4)]], (3, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: A.lu_solve(b)) + + # Square, noninvertible + A = DDM([[QQ(1), QQ(2)], [QQ(1), QQ(2)]], (2, 2), QQ) + b = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: A.lu_solve(b)) + + # Underdetermined + A = DDM([[QQ(1), QQ(2)]], (1, 2), QQ) + b = DDM([[QQ(3)]], (1, 1), QQ) + raises(NotImplementedError, lambda: A.lu_solve(b)) + + # Domain mismatch + bz = DDM([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMDomainError, lambda: A.lu_solve(bz)) + + # Shape mismatch + b3 = DDM([[QQ(1)], [QQ(2)], [QQ(3)]], (3, 1), QQ) + raises(DMShapeError, lambda: A.lu_solve(b3)) + + +def test_DDM_charpoly(): + A = DDM([], (0, 0), ZZ) + assert A.charpoly() == [ZZ(1)] + + A = DDM([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + Avec = [ZZ(1), ZZ(-15), ZZ(-18), ZZ(0)] + assert A.charpoly() == Avec + + A = DDM([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A.charpoly()) + + +def test_DDM_getitem(): + dm = DDM([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + + assert dm.getitem(1, 1) == ZZ(5) + assert dm.getitem(1, -2) == ZZ(5) + assert dm.getitem(-1, -3) == ZZ(7) + + raises(IndexError, lambda: dm.getitem(3, 3)) + + +def test_DDM_setitem(): + dm = DDM.zeros((3, 3), ZZ) + dm.setitem(0, 0, 1) + dm.setitem(1, -2, 1) + dm.setitem(-1, -1, 1) + assert dm == DDM.eye(3, ZZ) + + raises(IndexError, lambda: dm.setitem(3, 3, 0)) + + +def test_DDM_extract_slice(): + dm = DDM([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + + assert dm.extract_slice(slice(0, 3), slice(0, 3)) == dm + assert dm.extract_slice(slice(1, 3), slice(-2)) == DDM([[4], [7]], (2, 1), ZZ) + assert dm.extract_slice(slice(1, 3), slice(-2)) == DDM([[4], [7]], (2, 1), ZZ) + assert dm.extract_slice(slice(2, 3), slice(-2)) == DDM([[ZZ(7)]], (1, 1), ZZ) + assert dm.extract_slice(slice(0, 2), slice(-2)) == DDM([[1], [4]], (2, 1), ZZ) + assert dm.extract_slice(slice(-1), slice(-1)) == DDM([[1, 2], [4, 5]], (2, 2), ZZ) + + assert dm.extract_slice(slice(2), slice(3, 4)) == DDM([[], []], (2, 0), ZZ) + assert dm.extract_slice(slice(3, 4), slice(2)) == DDM([], (0, 2), ZZ) + assert dm.extract_slice(slice(3, 4), slice(3, 4)) == DDM([], (0, 0), ZZ) + + +def test_DDM_extract(): + dm1 = DDM([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + dm2 = DDM([ + [ZZ(6), ZZ(4)], + [ZZ(3), ZZ(1)]], (2, 2), ZZ) + assert dm1.extract([1, 0], [2, 0]) == dm2 + assert dm1.extract([-2, 0], [-1, 0]) == dm2 + + assert dm1.extract([], []) == DDM.zeros((0, 0), ZZ) + assert dm1.extract([1], []) == DDM.zeros((1, 0), ZZ) + assert dm1.extract([], [1]) == DDM.zeros((0, 1), ZZ) + + raises(IndexError, lambda: dm2.extract([2], [0])) + raises(IndexError, lambda: dm2.extract([0], [2])) + raises(IndexError, lambda: dm2.extract([-3], [0])) + raises(IndexError, lambda: dm2.extract([0], [-3])) + + +def test_DDM_flat(): + dm = DDM([ + [ZZ(6), ZZ(4)], + [ZZ(3), ZZ(1)]], (2, 2), ZZ) + assert dm.flat() == [ZZ(6), ZZ(4), ZZ(3), ZZ(1)] + + +def test_DDM_is_zero_matrix(): + A = DDM([[QQ(1), QQ(0)], [QQ(0), QQ(0)]], (2, 2), QQ) + Azero = DDM.zeros((1, 2), QQ) + assert A.is_zero_matrix() is False + assert Azero.is_zero_matrix() is True + + +def test_DDM_is_upper(): + # Wide matrices: + A = DDM([ + [QQ(1), QQ(2), QQ(3), QQ(4)], + [QQ(0), QQ(5), QQ(6), QQ(7)], + [QQ(0), QQ(0), QQ(8), QQ(9)] + ], (3, 4), QQ) + B = DDM([ + [QQ(1), QQ(2), QQ(3), QQ(4)], + [QQ(0), QQ(5), QQ(6), QQ(7)], + [QQ(0), QQ(7), QQ(8), QQ(9)] + ], (3, 4), QQ) + assert A.is_upper() is True + assert B.is_upper() is False + + # Tall matrices: + A = DDM([ + [QQ(1), QQ(2), QQ(3)], + [QQ(0), QQ(5), QQ(6)], + [QQ(0), QQ(0), QQ(8)], + [QQ(0), QQ(0), QQ(0)] + ], (4, 3), QQ) + B = DDM([ + [QQ(1), QQ(2), QQ(3)], + [QQ(0), QQ(5), QQ(6)], + [QQ(0), QQ(0), QQ(8)], + [QQ(0), QQ(0), QQ(10)] + ], (4, 3), QQ) + assert A.is_upper() is True + assert B.is_upper() is False + + +def test_DDM_is_lower(): + # Tall matrices: + A = DDM([ + [QQ(1), QQ(2), QQ(3), QQ(4)], + [QQ(0), QQ(5), QQ(6), QQ(7)], + [QQ(0), QQ(0), QQ(8), QQ(9)] + ], (3, 4), QQ).transpose() + B = DDM([ + [QQ(1), QQ(2), QQ(3), QQ(4)], + [QQ(0), QQ(5), QQ(6), QQ(7)], + [QQ(0), QQ(7), QQ(8), QQ(9)] + ], (3, 4), QQ).transpose() + assert A.is_lower() is True + assert B.is_lower() is False + + # Wide matrices: + A = DDM([ + [QQ(1), QQ(2), QQ(3)], + [QQ(0), QQ(5), QQ(6)], + [QQ(0), QQ(0), QQ(8)], + [QQ(0), QQ(0), QQ(0)] + ], (4, 3), QQ).transpose() + B = DDM([ + [QQ(1), QQ(2), QQ(3)], + [QQ(0), QQ(5), QQ(6)], + [QQ(0), QQ(0), QQ(8)], + [QQ(0), QQ(0), QQ(10)] + ], (4, 3), QQ).transpose() + assert A.is_lower() is True + assert B.is_lower() is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_dense.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_dense.py new file mode 100644 index 0000000000000000000000000000000000000000..75315ebf6b2ae7d53b4a5737578d3ac5ed4ea36a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_dense.py @@ -0,0 +1,350 @@ +from sympy.testing.pytest import raises + +from sympy.polys import ZZ, QQ + +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.dense import ( + ddm_transpose, + ddm_iadd, ddm_isub, ddm_ineg, ddm_imatmul, ddm_imul, ddm_irref, + ddm_idet, ddm_iinv, ddm_ilu, ddm_ilu_split, ddm_ilu_solve, ddm_berk) + +from sympy.polys.matrices.exceptions import ( + DMDomainError, + DMNonInvertibleMatrixError, + DMNonSquareMatrixError, + DMShapeError, +) + + +def test_ddm_transpose(): + a = [[1, 2], [3, 4]] + assert ddm_transpose(a) == [[1, 3], [2, 4]] + + +def test_ddm_iadd(): + a = [[1, 2], [3, 4]] + b = [[5, 6], [7, 8]] + ddm_iadd(a, b) + assert a == [[6, 8], [10, 12]] + + +def test_ddm_isub(): + a = [[1, 2], [3, 4]] + b = [[5, 6], [7, 8]] + ddm_isub(a, b) + assert a == [[-4, -4], [-4, -4]] + + +def test_ddm_ineg(): + a = [[1, 2], [3, 4]] + ddm_ineg(a) + assert a == [[-1, -2], [-3, -4]] + + +def test_ddm_matmul(): + a = [[1, 2], [3, 4]] + ddm_imul(a, 2) + assert a == [[2, 4], [6, 8]] + + a = [[1, 2], [3, 4]] + ddm_imul(a, 0) + assert a == [[0, 0], [0, 0]] + + +def test_ddm_imatmul(): + a = [[1, 2, 3], [4, 5, 6]] + b = [[1, 2], [3, 4], [5, 6]] + + c1 = [[0, 0], [0, 0]] + ddm_imatmul(c1, a, b) + assert c1 == [[22, 28], [49, 64]] + + c2 = [[0, 0, 0], [0, 0, 0], [0, 0, 0]] + ddm_imatmul(c2, b, a) + assert c2 == [[9, 12, 15], [19, 26, 33], [29, 40, 51]] + + b3 = [[1], [2], [3]] + c3 = [[0], [0]] + ddm_imatmul(c3, a, b3) + assert c3 == [[14], [32]] + + +def test_ddm_irref(): + # Empty matrix + A = [] + Ar = [] + pivots = [] + assert ddm_irref(A) == pivots + assert A == Ar + + # Standard square case + A = [[QQ(0), QQ(1)], [QQ(1), QQ(1)]] + Ar = [[QQ(1), QQ(0)], [QQ(0), QQ(1)]] + pivots = [0, 1] + assert ddm_irref(A) == pivots + assert A == Ar + + # m < n case + A = [[QQ(1), QQ(2), QQ(1)], [QQ(3), QQ(4), QQ(1)]] + Ar = [[QQ(1), QQ(0), QQ(-1)], [QQ(0), QQ(1), QQ(1)]] + pivots = [0, 1] + assert ddm_irref(A) == pivots + assert A == Ar + + # same m < n but reversed + A = [[QQ(3), QQ(4), QQ(1)], [QQ(1), QQ(2), QQ(1)]] + Ar = [[QQ(1), QQ(0), QQ(-1)], [QQ(0), QQ(1), QQ(1)]] + pivots = [0, 1] + assert ddm_irref(A) == pivots + assert A == Ar + + # m > n case + A = [[QQ(1), QQ(0)], [QQ(1), QQ(3)], [QQ(0), QQ(1)]] + Ar = [[QQ(1), QQ(0)], [QQ(0), QQ(1)], [QQ(0), QQ(0)]] + pivots = [0, 1] + assert ddm_irref(A) == pivots + assert A == Ar + + # Example with missing pivot + A = [[QQ(1), QQ(0), QQ(1)], [QQ(3), QQ(0), QQ(1)]] + Ar = [[QQ(1), QQ(0), QQ(0)], [QQ(0), QQ(0), QQ(1)]] + pivots = [0, 2] + assert ddm_irref(A) == pivots + assert A == Ar + + # Example with missing pivot and no replacement + A = [[QQ(0), QQ(1)], [QQ(0), QQ(2)], [QQ(1), QQ(0)]] + Ar = [[QQ(1), QQ(0)], [QQ(0), QQ(1)], [QQ(0), QQ(0)]] + pivots = [0, 1] + assert ddm_irref(A) == pivots + assert A == Ar + + +def test_ddm_idet(): + A = [] + assert ddm_idet(A, ZZ) == ZZ(1) + + A = [[ZZ(2)]] + assert ddm_idet(A, ZZ) == ZZ(2) + + A = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + assert ddm_idet(A, ZZ) == ZZ(-2) + + A = [[ZZ(1), ZZ(2), ZZ(3)], [ZZ(1), ZZ(2), ZZ(4)], [ZZ(1), ZZ(3), ZZ(5)]] + assert ddm_idet(A, ZZ) == ZZ(-1) + + A = [[ZZ(1), ZZ(2), ZZ(3)], [ZZ(1), ZZ(2), ZZ(4)], [ZZ(1), ZZ(2), ZZ(5)]] + assert ddm_idet(A, ZZ) == ZZ(0) + + A = [[QQ(1, 2), QQ(1, 2)], [QQ(1, 3), QQ(1, 4)]] + assert ddm_idet(A, QQ) == QQ(-1, 24) + + +def test_ddm_inv(): + A = [] + Ainv = [] + ddm_iinv(Ainv, A, QQ) + assert Ainv == A + + A = [] + Ainv = [] + raises(DMDomainError, lambda: ddm_iinv(Ainv, A, ZZ)) + + A = [[QQ(1), QQ(2)]] + Ainv = [[QQ(0), QQ(0)]] + raises(DMNonSquareMatrixError, lambda: ddm_iinv(Ainv, A, QQ)) + + A = [[QQ(1, 1), QQ(2, 1)], [QQ(3, 1), QQ(4, 1)]] + Ainv = [[QQ(0), QQ(0)], [QQ(0), QQ(0)]] + Ainv_expected = [[QQ(-2, 1), QQ(1, 1)], [QQ(3, 2), QQ(-1, 2)]] + ddm_iinv(Ainv, A, QQ) + assert Ainv == Ainv_expected + + A = [[QQ(1, 1), QQ(2, 1)], [QQ(2, 1), QQ(4, 1)]] + Ainv = [[QQ(0), QQ(0)], [QQ(0), QQ(0)]] + raises(DMNonInvertibleMatrixError, lambda: ddm_iinv(Ainv, A, QQ)) + + +def test_ddm_ilu(): + A = [] + Alu = [] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + A = [[]] + Alu = [[]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + A = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + Alu = [[QQ(1), QQ(2)], [QQ(3), QQ(-2)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + A = [[QQ(0), QQ(2)], [QQ(3), QQ(4)]] + Alu = [[QQ(3), QQ(4)], [QQ(0), QQ(2)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [(0, 1)] + + A = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)], [QQ(7), QQ(8), QQ(9)]] + Alu = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(-3), QQ(-6)], [QQ(7), QQ(2), QQ(0)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + A = [[QQ(0), QQ(1), QQ(2)], [QQ(0), QQ(1), QQ(3)], [QQ(1), QQ(1), QQ(2)]] + Alu = [[QQ(1), QQ(1), QQ(2)], [QQ(0), QQ(1), QQ(3)], [QQ(0), QQ(1), QQ(-1)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [(0, 2)] + + A = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]] + Alu = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(-3), QQ(-6)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + A = [[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]] + Alu = [[QQ(1), QQ(2)], [QQ(3), QQ(-2)], [QQ(5), QQ(2)]] + swaps = ddm_ilu(A) + assert A == Alu + assert swaps == [] + + +def test_ddm_ilu_split(): + U = [] + L = [] + Uexp = [] + Lexp = [] + swaps = ddm_ilu_split(L, U, QQ) + assert U == Uexp + assert L == Lexp + assert swaps == [] + + U = [[]] + L = [[QQ(1)]] + Uexp = [[]] + Lexp = [[QQ(1)]] + swaps = ddm_ilu_split(L, U, QQ) + assert U == Uexp + assert L == Lexp + assert swaps == [] + + U = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + L = [[QQ(1), QQ(0)], [QQ(0), QQ(1)]] + Uexp = [[QQ(1), QQ(2)], [QQ(0), QQ(-2)]] + Lexp = [[QQ(1), QQ(0)], [QQ(3), QQ(1)]] + swaps = ddm_ilu_split(L, U, QQ) + assert U == Uexp + assert L == Lexp + assert swaps == [] + + U = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]] + L = [[QQ(1), QQ(0)], [QQ(0), QQ(1)]] + Uexp = [[QQ(1), QQ(2), QQ(3)], [QQ(0), QQ(-3), QQ(-6)]] + Lexp = [[QQ(1), QQ(0)], [QQ(4), QQ(1)]] + swaps = ddm_ilu_split(L, U, QQ) + assert U == Uexp + assert L == Lexp + assert swaps == [] + + U = [[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]] + L = [[QQ(1), QQ(0), QQ(0)], [QQ(0), QQ(1), QQ(0)], [QQ(0), QQ(0), QQ(1)]] + Uexp = [[QQ(1), QQ(2)], [QQ(0), QQ(-2)], [QQ(0), QQ(0)]] + Lexp = [[QQ(1), QQ(0), QQ(0)], [QQ(3), QQ(1), QQ(0)], [QQ(5), QQ(2), QQ(1)]] + swaps = ddm_ilu_split(L, U, QQ) + assert U == Uexp + assert L == Lexp + assert swaps == [] + + +def test_ddm_ilu_solve(): + # Basic example + # A = [[QQ(1), QQ(2)], [QQ(3), QQ(4)]] + U = [[QQ(1), QQ(2)], [QQ(0), QQ(-2)]] + L = [[QQ(1), QQ(0)], [QQ(3), QQ(1)]] + swaps = [] + b = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + x = DDM([[QQ(0)], [QQ(0)]], (2, 1), QQ) + xexp = DDM([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + ddm_ilu_solve(x, L, U, swaps, b) + assert x == xexp + + # Example with swaps + # A = [[QQ(0), QQ(2)], [QQ(3), QQ(4)]] + U = [[QQ(3), QQ(4)], [QQ(0), QQ(2)]] + L = [[QQ(1), QQ(0)], [QQ(0), QQ(1)]] + swaps = [(0, 1)] + b = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + x = DDM([[QQ(0)], [QQ(0)]], (2, 1), QQ) + xexp = DDM([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + ddm_ilu_solve(x, L, U, swaps, b) + assert x == xexp + + # Overdetermined, consistent + # A = DDM([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]], (3, 2), QQ) + U = [[QQ(1), QQ(2)], [QQ(0), QQ(-2)], [QQ(0), QQ(0)]] + L = [[QQ(1), QQ(0), QQ(0)], [QQ(3), QQ(1), QQ(0)], [QQ(5), QQ(2), QQ(1)]] + swaps = [] + b = DDM([[QQ(1)], [QQ(2)], [QQ(3)]], (3, 1), QQ) + x = DDM([[QQ(0)], [QQ(0)]], (2, 1), QQ) + xexp = DDM([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + ddm_ilu_solve(x, L, U, swaps, b) + assert x == xexp + + # Overdetermined, inconsistent + b = DDM([[QQ(1)], [QQ(2)], [QQ(4)]], (3, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: ddm_ilu_solve(x, L, U, swaps, b)) + + # Square, noninvertible + # A = DDM([[QQ(1), QQ(2)], [QQ(1), QQ(2)]], (2, 2), QQ) + U = [[QQ(1), QQ(2)], [QQ(0), QQ(0)]] + L = [[QQ(1), QQ(0)], [QQ(1), QQ(1)]] + swaps = [] + b = DDM([[QQ(1)], [QQ(2)]], (2, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: ddm_ilu_solve(x, L, U, swaps, b)) + + # Underdetermined + # A = DDM([[QQ(1), QQ(2)]], (1, 2), QQ) + U = [[QQ(1), QQ(2)]] + L = [[QQ(1)]] + swaps = [] + b = DDM([[QQ(3)]], (1, 1), QQ) + raises(NotImplementedError, lambda: ddm_ilu_solve(x, L, U, swaps, b)) + + # Shape mismatch + b3 = DDM([[QQ(1)], [QQ(2)], [QQ(3)]], (3, 1), QQ) + raises(DMShapeError, lambda: ddm_ilu_solve(x, L, U, swaps, b3)) + + # Empty shape mismatch + U = [[QQ(1)]] + L = [[QQ(1)]] + swaps = [] + x = [[QQ(1)]] + b = [] + raises(DMShapeError, lambda: ddm_ilu_solve(x, L, U, swaps, b)) + + # Empty system + U = [] + L = [] + swaps = [] + b = [] + x = [] + ddm_ilu_solve(x, L, U, swaps, b) + assert x == [] + + +def test_ddm_charpoly(): + A = [] + assert ddm_berk(A, ZZ) == [[ZZ(1)]] + + A = [[ZZ(1), ZZ(2), ZZ(3)], [ZZ(4), ZZ(5), ZZ(6)], [ZZ(7), ZZ(8), ZZ(9)]] + Avec = [[ZZ(1)], [ZZ(-15)], [ZZ(-18)], [ZZ(0)]] + assert ddm_berk(A, ZZ) == Avec + + A = DDM([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: ddm_berk(A, ZZ)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainmatrix.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..2f45029fb080ca91e98ea04aa4717fa675492052 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainmatrix.py @@ -0,0 +1,1383 @@ +from sympy.external.gmpy import GROUND_TYPES + +from sympy import Integer, Rational, S, sqrt, Matrix, symbols +from sympy import FF, ZZ, QQ, QQ_I, EXRAW + +from sympy.polys.matrices.domainmatrix import DomainMatrix, DomainScalar, DM +from sympy.polys.matrices.exceptions import ( + DMBadInputError, DMDomainError, DMShapeError, DMFormatError, DMNotAField, + DMNonSquareMatrixError, DMNonInvertibleMatrixError, +) +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.sdm import SDM + +from sympy.testing.pytest import raises + + +def test_DM(): + ddm = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A = DM([[1, 2], [3, 4]], ZZ) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == ZZ + + +def test_DomainMatrix_init(): + lol = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + dod = {0: {0: ZZ(1), 1:ZZ(2)}, 1: {0:ZZ(3), 1:ZZ(4)}} + ddm = DDM(lol, (2, 2), ZZ) + sdm = SDM(dod, (2, 2), ZZ) + + A = DomainMatrix(lol, (2, 2), ZZ) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == ZZ + + A = DomainMatrix(dod, (2, 2), ZZ) + assert A.rep == sdm + assert A.shape == (2, 2) + assert A.domain == ZZ + + raises(TypeError, lambda: DomainMatrix(ddm, (2, 2), ZZ)) + raises(TypeError, lambda: DomainMatrix(sdm, (2, 2), ZZ)) + raises(TypeError, lambda: DomainMatrix(Matrix([[1]]), (1, 1), ZZ)) + + for fmt, rep in [('sparse', sdm), ('dense', ddm)]: + if fmt == 'dense' and GROUND_TYPES == 'flint': + rep = rep.to_dfm() + A = DomainMatrix(lol, (2, 2), ZZ, fmt=fmt) + assert A.rep == rep + A = DomainMatrix(dod, (2, 2), ZZ, fmt=fmt) + assert A.rep == rep + + raises(ValueError, lambda: DomainMatrix(lol, (2, 2), ZZ, fmt='invalid')) + + raises(DMBadInputError, lambda: DomainMatrix([[ZZ(1), ZZ(2)]], (2, 2), ZZ)) + + # uses copy + was = [i.copy() for i in lol] + A[0,0] = ZZ(42) + assert was == lol + + +def test_DomainMatrix_from_rep(): + ddm = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A = DomainMatrix.from_rep(ddm) + # XXX: Should from_rep convert to DFM? + assert A.rep == ddm + assert A.shape == (2, 2) + assert A.domain == ZZ + + sdm = SDM({0: {0: ZZ(1), 1:ZZ(2)}, 1: {0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + A = DomainMatrix.from_rep(sdm) + assert A.rep == sdm + assert A.shape == (2, 2) + assert A.domain == ZZ + + A = DomainMatrix([[ZZ(1)]], (1, 1), ZZ) + raises(TypeError, lambda: DomainMatrix.from_rep(A)) + + +def test_DomainMatrix_from_list(): + ddm = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A = DomainMatrix.from_list([[1, 2], [3, 4]], ZZ) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == ZZ + + dom = FF(7) + ddm = DDM([[dom(1), dom(2)], [dom(3), dom(4)]], (2, 2), dom) + A = DomainMatrix.from_list([[1, 2], [3, 4]], dom) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == dom + + dom = FF(2**127-1) + ddm = DDM([[dom(1), dom(2)], [dom(3), dom(4)]], (2, 2), dom) + A = DomainMatrix.from_list([[1, 2], [3, 4]], dom) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == dom + + ddm = DDM([[QQ(1, 2), QQ(3, 1)], [QQ(1, 4), QQ(5, 1)]], (2, 2), QQ) + A = DomainMatrix.from_list([[(1, 2), (3, 1)], [(1, 4), (5, 1)]], QQ) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == QQ + + +def test_DomainMatrix_from_list_sympy(): + ddm = DDM([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A = DomainMatrix.from_list_sympy(2, 2, [[1, 2], [3, 4]]) + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == ZZ + + K = QQ.algebraic_field(sqrt(2)) + ddm = DDM( + [[K.convert(1 + sqrt(2)), K.convert(2 + sqrt(2))], + [K.convert(3 + sqrt(2)), K.convert(4 + sqrt(2))]], + (2, 2), + K + ) + A = DomainMatrix.from_list_sympy( + 2, 2, [[1 + sqrt(2), 2 + sqrt(2)], [3 + sqrt(2), 4 + sqrt(2)]], + extension=True) + assert A.rep == ddm + assert A.shape == (2, 2) + assert A.domain == K + + +def test_DomainMatrix_from_dict_sympy(): + sdm = SDM({0: {0: QQ(1, 2)}, 1: {1: QQ(2, 3)}}, (2, 2), QQ) + sympy_dict = {0: {0: Rational(1, 2)}, 1: {1: Rational(2, 3)}} + A = DomainMatrix.from_dict_sympy(2, 2, sympy_dict) + assert A.rep == sdm + assert A.shape == (2, 2) + assert A.domain == QQ + + fds = DomainMatrix.from_dict_sympy + raises(DMBadInputError, lambda: fds(2, 2, {3: {0: Rational(1, 2)}})) + raises(DMBadInputError, lambda: fds(2, 2, {0: {3: Rational(1, 2)}})) + + +def test_DomainMatrix_from_Matrix(): + sdm = SDM({0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}}, (2, 2), ZZ) + A = DomainMatrix.from_Matrix(Matrix([[1, 2], [3, 4]])) + assert A.rep == sdm + assert A.shape == (2, 2) + assert A.domain == ZZ + + K = QQ.algebraic_field(sqrt(2)) + sdm = SDM( + {0: {0: K.convert(1 + sqrt(2)), 1: K.convert(2 + sqrt(2))}, + 1: {0: K.convert(3 + sqrt(2)), 1: K.convert(4 + sqrt(2))}}, + (2, 2), + K + ) + A = DomainMatrix.from_Matrix( + Matrix([[1 + sqrt(2), 2 + sqrt(2)], [3 + sqrt(2), 4 + sqrt(2)]]), + extension=True) + assert A.rep == sdm + assert A.shape == (2, 2) + assert A.domain == K + + A = DomainMatrix.from_Matrix(Matrix([[QQ(1, 2), QQ(3, 4)], [QQ(0, 1), QQ(0, 1)]]), fmt='dense') + ddm = DDM([[QQ(1, 2), QQ(3, 4)], [QQ(0, 1), QQ(0, 1)]], (2, 2), QQ) + + if GROUND_TYPES != 'flint': + assert A.rep == ddm + else: + assert A.rep == ddm.to_dfm() + assert A.shape == (2, 2) + assert A.domain == QQ + + +def test_DomainMatrix_eq(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A == A + B = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(1)]], (2, 2), ZZ) + assert A != B + C = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + assert A != C + + +def test_DomainMatrix_unify_eq(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B1 = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + B2 = DomainMatrix([[QQ(1), QQ(3)], [QQ(3), QQ(4)]], (2, 2), QQ) + B3 = DomainMatrix([[ZZ(1)]], (1, 1), ZZ) + assert A.unify_eq(B1) is True + assert A.unify_eq(B2) is False + assert A.unify_eq(B3) is False + + +def test_DomainMatrix_get_domain(): + K, items = DomainMatrix.get_domain([1, 2, 3, 4]) + assert items == [ZZ(1), ZZ(2), ZZ(3), ZZ(4)] + assert K == ZZ + + K, items = DomainMatrix.get_domain([1, 2, 3, Rational(1, 2)]) + assert items == [QQ(1), QQ(2), QQ(3), QQ(1, 2)] + assert K == QQ + + +def test_DomainMatrix_convert_to(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = A.convert_to(QQ) + assert Aq == DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + + +def test_DomainMatrix_choose_domain(): + A = [[1, 2], [3, 0]] + assert DM(A, QQ).choose_domain() == DM(A, ZZ) + assert DM(A, QQ).choose_domain(field=True) == DM(A, QQ) + assert DM(A, ZZ).choose_domain(field=True) == DM(A, QQ) + + x = symbols('x') + B = [[1, x], [x**2, x**3]] + assert DM(B, QQ[x]).choose_domain(field=True) == DM(B, ZZ.frac_field(x)) + + +def test_DomainMatrix_to_flat_nz(): + Adm = DM([[1, 2], [3, 0]], ZZ) + Addm = Adm.rep.to_ddm() + Asdm = Adm.rep.to_sdm() + for A in [Adm, Addm, Asdm]: + elems, data = A.to_flat_nz() + assert A.from_flat_nz(elems, data, A.domain) == A + elemsq = [QQ(e) for e in elems] + assert A.from_flat_nz(elemsq, data, QQ) == A.convert_to(QQ) + elems2 = [2*e for e in elems] + assert A.from_flat_nz(elems2, data, A.domain) == 2*A + + +def test_DomainMatrix_to_sympy(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_sympy() == A.convert_to(EXRAW) + + +def test_DomainMatrix_to_field(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = A.to_field() + assert Aq == DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + + +def test_DomainMatrix_to_sparse(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A_sparse = A.to_sparse() + assert A_sparse.rep == {0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}} + + +def test_DomainMatrix_to_dense(): + A = DomainMatrix({0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}}, (2, 2), ZZ) + A_dense = A.to_dense() + ddm = DDM([[1, 2], [3, 4]], (2, 2), ZZ) + if GROUND_TYPES != 'flint': + assert A_dense.rep == ddm + else: + assert A_dense.rep == ddm.to_dfm() + + +def test_DomainMatrix_unify(): + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + assert Az.unify(Az) == (Az, Az) + assert Az.unify(Aq) == (Aq, Aq) + assert Aq.unify(Az) == (Aq, Aq) + assert Aq.unify(Aq) == (Aq, Aq) + + As = DomainMatrix({0: {1: ZZ(1)}, 1:{0:ZZ(2)}}, (2, 2), ZZ) + Ad = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + assert As.unify(As) == (As, As) + assert Ad.unify(Ad) == (Ad, Ad) + + Bs, Bd = As.unify(Ad, fmt='dense') + assert Bs.rep == DDM([[0, 1], [2, 0]], (2, 2), ZZ).to_dfm_or_ddm() + assert Bd.rep == DDM([[1, 2],[3, 4]], (2, 2), ZZ).to_dfm_or_ddm() + + Bs, Bd = As.unify(Ad, fmt='sparse') + assert Bs.rep == SDM({0: {1: 1}, 1: {0: 2}}, (2, 2), ZZ) + assert Bd.rep == SDM({0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}}, (2, 2), ZZ) + + raises(ValueError, lambda: As.unify(Ad, fmt='invalid')) + + +def test_DomainMatrix_to_Matrix(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A_Matrix = Matrix([[1, 2], [3, 4]]) + assert A.to_Matrix() == A_Matrix + assert A.to_sparse().to_Matrix() == A_Matrix + assert A.convert_to(QQ).to_Matrix() == A_Matrix + assert A.convert_to(QQ.algebraic_field(sqrt(2))).to_Matrix() == A_Matrix + + +def test_DomainMatrix_to_list(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_list() == [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + + +def test_DomainMatrix_to_list_flat(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_list_flat() == [ZZ(1), ZZ(2), ZZ(3), ZZ(4)] + + +def test_DomainMatrix_flat(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.flat() == [ZZ(1), ZZ(2), ZZ(3), ZZ(4)] + + +def test_DomainMatrix_from_list_flat(): + nums = [ZZ(1), ZZ(2), ZZ(3), ZZ(4)] + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + assert DomainMatrix.from_list_flat(nums, (2, 2), ZZ) == A + assert DDM.from_list_flat(nums, (2, 2), ZZ) == A.rep.to_ddm() + assert SDM.from_list_flat(nums, (2, 2), ZZ) == A.rep.to_sdm() + + assert A == A.from_list_flat(A.to_list_flat(), A.shape, A.domain) + + raises(DMBadInputError, DomainMatrix.from_list_flat, nums, (2, 3), ZZ) + raises(DMBadInputError, DDM.from_list_flat, nums, (2, 3), ZZ) + raises(DMBadInputError, SDM.from_list_flat, nums, (2, 3), ZZ) + + +def test_DomainMatrix_to_dod(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_dod() == {0: {0: ZZ(1), 1:ZZ(2)}, 1: {0:ZZ(3), 1:ZZ(4)}} + A = DomainMatrix([[ZZ(1), ZZ(0)], [ZZ(0), ZZ(4)]], (2, 2), ZZ) + assert A.to_dod() == {0: {0: ZZ(1)}, 1: {1: ZZ(4)}} + + +def test_DomainMatrix_from_dod(): + items = {0: {0: ZZ(1), 1:ZZ(2)}, 1: {0:ZZ(3), 1:ZZ(4)}} + A = DM([[1, 2], [3, 4]], ZZ) + assert DomainMatrix.from_dod(items, (2, 2), ZZ) == A.to_sparse() + assert A.from_dod_like(items) == A + assert A.from_dod_like(items, QQ) == A.convert_to(QQ) + + +def test_DomainMatrix_to_dok(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_dok() == {(0, 0):ZZ(1), (0, 1):ZZ(2), (1, 0):ZZ(3), (1, 1):ZZ(4)} + A = DomainMatrix([[ZZ(1), ZZ(0)], [ZZ(0), ZZ(4)]], (2, 2), ZZ) + dok = {(0, 0):ZZ(1), (1, 1):ZZ(4)} + assert A.to_dok() == dok + assert A.to_dense().to_dok() == dok + assert A.to_sparse().to_dok() == dok + assert A.rep.to_ddm().to_dok() == dok + assert A.rep.to_sdm().to_dok() == dok + + +def test_DomainMatrix_from_dok(): + items = {(0, 0): ZZ(1), (1, 1): ZZ(2)} + A = DM([[1, 0], [0, 2]], ZZ) + assert DomainMatrix.from_dok(items, (2, 2), ZZ) == A.to_sparse() + assert DDM.from_dok(items, (2, 2), ZZ) == A.rep.to_ddm() + assert SDM.from_dok(items, (2, 2), ZZ) == A.rep.to_sdm() + + +def test_DomainMatrix_repr(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert repr(A) == 'DomainMatrix([[1, 2], [3, 4]], (2, 2), ZZ)' + + +def test_DomainMatrix_transpose(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + AT = DomainMatrix([[ZZ(1), ZZ(3)], [ZZ(2), ZZ(4)]], (2, 2), ZZ) + assert A.transpose() == AT + + +def test_DomainMatrix_is_zero_matrix(): + A = DomainMatrix([[ZZ(1)]], (1, 1), ZZ) + B = DomainMatrix([[ZZ(0)]], (1, 1), ZZ) + assert A.is_zero_matrix is False + assert B.is_zero_matrix is True + + +def test_DomainMatrix_is_upper(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(0), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.is_upper is True + assert B.is_upper is False + + +def test_DomainMatrix_is_lower(): + A = DomainMatrix([[ZZ(1), ZZ(0)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.is_lower is True + assert B.is_lower is False + + +def test_DomainMatrix_is_diagonal(): + A = DM([[1, 0], [0, 4]], ZZ) + B = DM([[1, 2], [3, 4]], ZZ) + assert A.is_diagonal is A.to_sparse().is_diagonal is True + assert B.is_diagonal is B.to_sparse().is_diagonal is False + + +def test_DomainMatrix_is_square(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)], [ZZ(5), ZZ(6)]], (3, 2), ZZ) + assert A.is_square is True + assert B.is_square is False + + +def test_DomainMatrix_diagonal(): + A = DM([[1, 2], [3, 4]], ZZ) + assert A.diagonal() == A.to_sparse().diagonal() == [ZZ(1), ZZ(4)] + A = DM([[1, 2], [3, 4], [5, 6]], ZZ) + assert A.diagonal() == A.to_sparse().diagonal() == [ZZ(1), ZZ(4)] + A = DM([[1, 2, 3], [4, 5, 6]], ZZ) + assert A.diagonal() == A.to_sparse().diagonal() == [ZZ(1), ZZ(5)] + + +def test_DomainMatrix_rank(): + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(6), QQ(8)]], (3, 2), QQ) + assert A.rank() == 2 + + +def test_DomainMatrix_add(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(2), ZZ(4)], [ZZ(6), ZZ(8)]], (2, 2), ZZ) + assert A + A == A.add(A) == B + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + L = [[2, 3], [3, 4]] + raises(TypeError, lambda: A + L) + raises(TypeError, lambda: L + A) + + A1 = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A2 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A1 + A2) + raises(DMShapeError, lambda: A2 + A1) + raises(DMShapeError, lambda: A1.add(A2)) + raises(DMShapeError, lambda: A2.add(A1)) + + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Asum = DomainMatrix([[QQ(2), QQ(4)], [QQ(6), QQ(8)]], (2, 2), QQ) + assert Az + Aq == Asum + assert Aq + Az == Asum + raises(DMDomainError, lambda: Az.add(Aq)) + raises(DMDomainError, lambda: Aq.add(Az)) + + As = DomainMatrix({0: {1: ZZ(1)}, 1: {0: ZZ(2)}}, (2, 2), ZZ) + Ad = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + Asd = As + Ad + Ads = Ad + As + assert Asd == DomainMatrix([[1, 3], [5, 4]], (2, 2), ZZ) + assert Asd.rep == DDM([[1, 3], [5, 4]], (2, 2), ZZ).to_dfm_or_ddm() + assert Ads == DomainMatrix([[1, 3], [5, 4]], (2, 2), ZZ) + assert Ads.rep == DDM([[1, 3], [5, 4]], (2, 2), ZZ).to_dfm_or_ddm() + raises(DMFormatError, lambda: As.add(Ad)) + + +def test_DomainMatrix_sub(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(0), ZZ(0)], [ZZ(0), ZZ(0)]], (2, 2), ZZ) + assert A - A == A.sub(A) == B + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + L = [[2, 3], [3, 4]] + raises(TypeError, lambda: A - L) + raises(TypeError, lambda: L - A) + + A1 = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A2 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A1 - A2) + raises(DMShapeError, lambda: A2 - A1) + raises(DMShapeError, lambda: A1.sub(A2)) + raises(DMShapeError, lambda: A2.sub(A1)) + + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Adiff = DomainMatrix([[QQ(0), QQ(0)], [QQ(0), QQ(0)]], (2, 2), QQ) + assert Az - Aq == Adiff + assert Aq - Az == Adiff + raises(DMDomainError, lambda: Az.sub(Aq)) + raises(DMDomainError, lambda: Aq.sub(Az)) + + As = DomainMatrix({0: {1: ZZ(1)}, 1: {0: ZZ(2)}}, (2, 2), ZZ) + Ad = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + Asd = As - Ad + Ads = Ad - As + assert Asd == DomainMatrix([[-1, -1], [-1, -4]], (2, 2), ZZ) + assert Asd.rep == DDM([[-1, -1], [-1, -4]], (2, 2), ZZ).to_dfm_or_ddm() + assert Asd == -Ads + assert Asd.rep == -Ads.rep + + +def test_DomainMatrix_neg(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aneg = DomainMatrix([[ZZ(-1), ZZ(-2)], [ZZ(-3), ZZ(-4)]], (2, 2), ZZ) + assert -A == A.neg() == Aneg + + +def test_DomainMatrix_mul(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A2 = DomainMatrix([[ZZ(7), ZZ(10)], [ZZ(15), ZZ(22)]], (2, 2), ZZ) + assert A*A == A.matmul(A) == A2 + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + L = [[1, 2], [3, 4]] + raises(TypeError, lambda: A * L) + raises(TypeError, lambda: L * A) + + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Aq = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Aprod = DomainMatrix([[QQ(7), QQ(10)], [QQ(15), QQ(22)]], (2, 2), QQ) + assert Az * Aq == Aprod + assert Aq * Az == Aprod + raises(DMDomainError, lambda: Az.matmul(Aq)) + raises(DMDomainError, lambda: Aq.matmul(Az)) + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + AA = DomainMatrix([[ZZ(2), ZZ(4)], [ZZ(6), ZZ(8)]], (2, 2), ZZ) + x = ZZ(2) + assert A * x == x * A == A.mul(x) == AA + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + AA = DomainMatrix.zeros((2, 2), ZZ) + x = ZZ(0) + assert A * x == x * A == A.mul(x).to_sparse() == AA + + As = DomainMatrix({0: {1: ZZ(1)}, 1: {0: ZZ(2)}}, (2, 2), ZZ) + Ad = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + + Asd = As * Ad + Ads = Ad * As + assert Asd == DomainMatrix([[3, 4], [2, 4]], (2, 2), ZZ) + assert Asd.rep == DDM([[3, 4], [2, 4]], (2, 2), ZZ).to_dfm_or_ddm() + assert Ads == DomainMatrix([[4, 1], [8, 3]], (2, 2), ZZ) + assert Ads.rep == DDM([[4, 1], [8, 3]], (2, 2), ZZ).to_dfm_or_ddm() + + +def test_DomainMatrix_mul_elementwise(): + A = DomainMatrix([[ZZ(2), ZZ(2)], [ZZ(0), ZZ(0)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(4), ZZ(0)], [ZZ(3), ZZ(0)]], (2, 2), ZZ) + C = DomainMatrix([[ZZ(8), ZZ(0)], [ZZ(0), ZZ(0)]], (2, 2), ZZ) + assert A.mul_elementwise(B) == C + assert B.mul_elementwise(A) == C + + +def test_DomainMatrix_pow(): + eye = DomainMatrix.eye(2, ZZ) + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + A2 = DomainMatrix([[ZZ(7), ZZ(10)], [ZZ(15), ZZ(22)]], (2, 2), ZZ) + A3 = DomainMatrix([[ZZ(37), ZZ(54)], [ZZ(81), ZZ(118)]], (2, 2), ZZ) + assert A**0 == A.pow(0) == eye + assert A**1 == A.pow(1) == A + assert A**2 == A.pow(2) == A2 + assert A**3 == A.pow(3) == A3 + + raises(TypeError, lambda: A ** Rational(1, 2)) + raises(NotImplementedError, lambda: A ** -1) + raises(NotImplementedError, lambda: A.pow(-1)) + + A = DomainMatrix.zeros((2, 1), ZZ) + raises(DMNonSquareMatrixError, lambda: A ** 1) + + +def test_DomainMatrix_clear_denoms(): + A = DM([[(1,2),(1,3)],[(1,4),(1,5)]], QQ) + + den_Z = DomainScalar(ZZ(60), ZZ) + Anum_Z = DM([[30, 20], [15, 12]], ZZ) + Anum_Q = Anum_Z.convert_to(QQ) + + assert A.clear_denoms() == (den_Z, Anum_Q) + assert A.clear_denoms(convert=True) == (den_Z, Anum_Z) + assert A * den_Z == Anum_Q + assert A == Anum_Q / den_Z + + +def test_DomainMatrix_clear_denoms_rowwise(): + A = DM([[(1,2),(1,3)],[(1,4),(1,5)]], QQ) + + den_Z = DM([[6, 0], [0, 20]], ZZ).to_sparse() + Anum_Z = DM([[3, 2], [5, 4]], ZZ) + Anum_Q = DM([[3, 2], [5, 4]], QQ) + + assert A.clear_denoms_rowwise() == (den_Z, Anum_Q) + assert A.clear_denoms_rowwise(convert=True) == (den_Z, Anum_Z) + assert den_Z * A == Anum_Q + assert A == den_Z.to_field().inv() * Anum_Q + + A = DM([[(1,2),(1,3),0,0],[0,0,0,0], [(1,4),(1,5),(1,6),(1,7)]], QQ) + den_Z = DM([[6, 0, 0], [0, 1, 0], [0, 0, 420]], ZZ).to_sparse() + Anum_Z = DM([[3, 2, 0, 0], [0, 0, 0, 0], [105, 84, 70, 60]], ZZ) + Anum_Q = Anum_Z.convert_to(QQ) + + assert A.clear_denoms_rowwise() == (den_Z, Anum_Q) + assert A.clear_denoms_rowwise(convert=True) == (den_Z, Anum_Z) + assert den_Z * A == Anum_Q + assert A == den_Z.to_field().inv() * Anum_Q + + +def test_DomainMatrix_cancel_denom(): + A = DM([[2, 4], [6, 8]], ZZ) + assert A.cancel_denom(ZZ(1)) == (DM([[2, 4], [6, 8]], ZZ), ZZ(1)) + assert A.cancel_denom(ZZ(3)) == (DM([[2, 4], [6, 8]], ZZ), ZZ(3)) + assert A.cancel_denom(ZZ(4)) == (DM([[1, 2], [3, 4]], ZZ), ZZ(2)) + + A = DM([[1, 2], [3, 4]], ZZ) + assert A.cancel_denom(ZZ(2)) == (A, ZZ(2)) + assert A.cancel_denom(ZZ(-2)) == (-A, ZZ(2)) + + # Test canonicalization of denominator over Gaussian rationals. + A = DM([[1, 2], [3, 4]], QQ_I) + assert A.cancel_denom(QQ_I(0,2)) == (QQ_I(0,-1)*A, QQ_I(2)) + + raises(ZeroDivisionError, lambda: A.cancel_denom(ZZ(0))) + + +def test_DomainMatrix_cancel_denom_elementwise(): + A = DM([[2, 4], [6, 8]], ZZ) + numers, denoms = A.cancel_denom_elementwise(ZZ(1)) + assert numers == DM([[2, 4], [6, 8]], ZZ) + assert denoms == DM([[1, 1], [1, 1]], ZZ) + numers, denoms = A.cancel_denom_elementwise(ZZ(4)) + assert numers == DM([[1, 1], [3, 2]], ZZ) + assert denoms == DM([[2, 1], [2, 1]], ZZ) + + raises(ZeroDivisionError, lambda: A.cancel_denom_elementwise(ZZ(0))) + + +def test_DomainMatrix_content_primitive(): + A = DM([[2, 4], [6, 8]], ZZ) + A_primitive = DM([[1, 2], [3, 4]], ZZ) + A_content = ZZ(2) + assert A.content() == A_content + assert A.primitive() == (A_content, A_primitive) + + +def test_DomainMatrix_scc(): + Ad = DomainMatrix([[ZZ(1), ZZ(2), ZZ(3)], + [ZZ(0), ZZ(1), ZZ(0)], + [ZZ(2), ZZ(0), ZZ(4)]], (3, 3), ZZ) + As = Ad.to_sparse() + Addm = Ad.rep + Asdm = As.rep + for A in [Ad, As, Addm, Asdm]: + assert Ad.scc() == [[1], [0, 2]] + + A = DM([[ZZ(1), ZZ(2), ZZ(3)]], ZZ) + raises(DMNonSquareMatrixError, lambda: A.scc()) + + +def test_DomainMatrix_rref(): + # More tests in test_rref.py + A = DomainMatrix([], (0, 1), QQ) + assert A.rref() == (A, ()) + + A = DomainMatrix([[QQ(1)]], (1, 1), QQ) + assert A.rref() == (A, (0,)) + + A = DomainMatrix([[QQ(0)]], (1, 1), QQ) + assert A.rref() == (A, ()) + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Ar, pivots = A.rref() + assert Ar == DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + assert pivots == (0, 1) + + A = DomainMatrix([[QQ(0), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Ar, pivots = A.rref() + assert Ar == DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + assert pivots == (0, 1) + + A = DomainMatrix([[QQ(0), QQ(2)], [QQ(0), QQ(4)]], (2, 2), QQ) + Ar, pivots = A.rref() + assert Ar == DomainMatrix([[QQ(0), QQ(1)], [QQ(0), QQ(0)]], (2, 2), QQ) + assert pivots == (1,) + + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + Ar, pivots = Az.rref() + assert Ar == DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + assert pivots == (0, 1) + + methods = ('auto', 'GJ', 'FF', 'CD', 'GJ_dense', 'FF_dense', 'CD_dense') + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + for method in methods: + Ar, pivots = Az.rref(method=method) + assert Ar == DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + assert pivots == (0, 1) + + raises(ValueError, lambda: Az.rref(method='foo')) + raises(ValueError, lambda: Az.rref_den(method='foo')) + + +def test_DomainMatrix_columnspace(): + A = DomainMatrix([[QQ(1), QQ(-1), QQ(1)], [QQ(2), QQ(-2), QQ(3)]], (2, 3), QQ) + Acol = DomainMatrix([[QQ(1), QQ(1)], [QQ(2), QQ(3)]], (2, 2), QQ) + assert A.columnspace() == Acol + + Az = DomainMatrix([[ZZ(1), ZZ(-1), ZZ(1)], [ZZ(2), ZZ(-2), ZZ(3)]], (2, 3), ZZ) + raises(DMNotAField, lambda: Az.columnspace()) + + A = DomainMatrix([[QQ(1), QQ(-1), QQ(1)], [QQ(2), QQ(-2), QQ(3)]], (2, 3), QQ, fmt='sparse') + Acol = DomainMatrix({0: {0: QQ(1), 1: QQ(1)}, 1: {0: QQ(2), 1: QQ(3)}}, (2, 2), QQ) + assert A.columnspace() == Acol + + +def test_DomainMatrix_rowspace(): + A = DomainMatrix([[QQ(1), QQ(-1), QQ(1)], [QQ(2), QQ(-2), QQ(3)]], (2, 3), QQ) + assert A.rowspace() == A + + Az = DomainMatrix([[ZZ(1), ZZ(-1), ZZ(1)], [ZZ(2), ZZ(-2), ZZ(3)]], (2, 3), ZZ) + raises(DMNotAField, lambda: Az.rowspace()) + + A = DomainMatrix([[QQ(1), QQ(-1), QQ(1)], [QQ(2), QQ(-2), QQ(3)]], (2, 3), QQ, fmt='sparse') + assert A.rowspace() == A + + +def test_DomainMatrix_nullspace(): + A = DomainMatrix([[QQ(1), QQ(1)], [QQ(1), QQ(1)]], (2, 2), QQ) + Anull = DomainMatrix([[QQ(-1), QQ(1)]], (1, 2), QQ) + assert A.nullspace() == Anull + + A = DomainMatrix([[ZZ(1), ZZ(1)], [ZZ(1), ZZ(1)]], (2, 2), ZZ) + Anull = DomainMatrix([[ZZ(-1), ZZ(1)]], (1, 2), ZZ) + assert A.nullspace() == Anull + + raises(DMNotAField, lambda: A.nullspace(divide_last=True)) + + A = DomainMatrix([[ZZ(2), ZZ(2)], [ZZ(2), ZZ(2)]], (2, 2), ZZ) + Anull = DomainMatrix([[ZZ(-2), ZZ(2)]], (1, 2), ZZ) + + Arref, den, pivots = A.rref_den() + assert den == ZZ(2) + assert Arref.nullspace_from_rref() == Anull + assert Arref.nullspace_from_rref(pivots) == Anull + assert Arref.to_sparse().nullspace_from_rref() == Anull.to_sparse() + assert Arref.to_sparse().nullspace_from_rref(pivots) == Anull.to_sparse() + + +def test_DomainMatrix_solve(): + # XXX: Maybe the _solve method should be changed... + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(2), QQ(4)]], (2, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + particular = DomainMatrix([[1, 0]], (1, 2), QQ) + nullspace = DomainMatrix([[-2, 1]], (1, 2), QQ) + assert A._solve(b) == (particular, nullspace) + + b3 = DomainMatrix([[QQ(1)], [QQ(1)], [QQ(1)]], (3, 1), QQ) + raises(DMShapeError, lambda: A._solve(b3)) + + bz = DomainMatrix([[ZZ(1)], [ZZ(1)]], (2, 1), ZZ) + raises(DMNotAField, lambda: A._solve(bz)) + + +def test_DomainMatrix_inv(): + A = DomainMatrix([], (0, 0), QQ) + assert A.inv() == A + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Ainv = DomainMatrix([[QQ(-2), QQ(1)], [QQ(3, 2), QQ(-1, 2)]], (2, 2), QQ) + assert A.inv() == Ainv + + Az = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + raises(DMNotAField, lambda: Az.inv()) + + Ans = DomainMatrix([[QQ(1), QQ(2)]], (1, 2), QQ) + raises(DMNonSquareMatrixError, lambda: Ans.inv()) + + Aninv = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(6)]], (2, 2), QQ) + raises(DMNonInvertibleMatrixError, lambda: Aninv.inv()) + + Z3 = FF(3) + assert DM([[1, 2], [3, 4]], Z3).inv() == DM([[1, 1], [0, 1]], Z3) + + Z6 = FF(6) + raises(DMNotAField, lambda: DM([[1, 2], [3, 4]], Z6).inv()) + + +def test_DomainMatrix_det(): + A = DomainMatrix([], (0, 0), ZZ) + assert A.det() == 1 + + A = DomainMatrix([[1]], (1, 1), ZZ) + assert A.det() == 1 + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.det() == ZZ(-2) + + A = DomainMatrix([[ZZ(1), ZZ(2), ZZ(3)], [ZZ(1), ZZ(2), ZZ(4)], [ZZ(1), ZZ(3), ZZ(5)]], (3, 3), ZZ) + assert A.det() == ZZ(-1) + + A = DomainMatrix([[ZZ(1), ZZ(2), ZZ(3)], [ZZ(1), ZZ(2), ZZ(4)], [ZZ(1), ZZ(2), ZZ(5)]], (3, 3), ZZ) + assert A.det() == ZZ(0) + + Ans = DomainMatrix([[QQ(1), QQ(2)]], (1, 2), QQ) + raises(DMNonSquareMatrixError, lambda: Ans.det()) + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + assert A.det() == QQ(-2) + + +def test_DomainMatrix_eval_poly(): + dM = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + p = [ZZ(1), ZZ(2), ZZ(3)] + result = DomainMatrix([[ZZ(12), ZZ(14)], [ZZ(21), ZZ(33)]], (2, 2), ZZ) + assert dM.eval_poly(p) == result == p[0]*dM**2 + p[1]*dM + p[2]*dM**0 + assert dM.eval_poly([]) == dM.zeros(dM.shape, dM.domain) + assert dM.eval_poly([ZZ(2)]) == 2*dM.eye(2, dM.domain) + + dM2 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMNonSquareMatrixError, lambda: dM2.eval_poly([ZZ(1)])) + + +def test_DomainMatrix_eval_poly_mul(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + p = [ZZ(1), ZZ(2), ZZ(3)] + result = DomainMatrix([[ZZ(40)], [ZZ(87)]], (2, 1), ZZ) + assert A.eval_poly_mul(p, b) == result == p[0]*A**2*b + p[1]*A*b + p[2]*b + + dM = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + dM1 = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMNonSquareMatrixError, lambda: dM1.eval_poly_mul([ZZ(1)], b)) + b1 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: dM.eval_poly_mul([ZZ(1)], b1)) + bq = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + raises(DMDomainError, lambda: dM.eval_poly_mul([ZZ(1)], bq)) + + +def _check_solve_den(A, b, xnum, xden): + # Examples for solve_den, solve_den_charpoly, solve_den_rref should use + # this so that all methods and types are tested. + + case1 = (A, xnum, b) + case2 = (A.to_sparse(), xnum.to_sparse(), b.to_sparse()) + + for Ai, xnum_i, b_i in [case1, case2]: + # The key invariant for solve_den: + assert Ai*xnum_i == xden*b_i + + # solve_den_rref can differ at least by a minus sign + answers = [(xnum_i, xden), (-xnum_i, -xden)] + assert Ai.solve_den(b) in answers + assert Ai.solve_den(b, method='rref') in answers + assert Ai.solve_den_rref(b) in answers + + # charpoly can only be used if A is square and guarantees to return the + # actual determinant as a denominator. + m, n = Ai.shape + if m == n: + assert Ai.solve_den(b_i, method='charpoly') == (xnum_i, xden) + assert Ai.solve_den_charpoly(b_i) == (xnum_i, xden) + else: + raises(DMNonSquareMatrixError, lambda: Ai.solve_den_charpoly(b)) + raises(DMNonSquareMatrixError, lambda: Ai.solve_den(b, method='charpoly')) + + +def test_DomainMatrix_solve_den(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + result = DomainMatrix([[ZZ(0)], [ZZ(-1)]], (2, 1), ZZ) + den = ZZ(-2) + _check_solve_den(A, b, result, den) + + A = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(1), ZZ(2), ZZ(4)], + [ZZ(1), ZZ(3), ZZ(5)]], (3, 3), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)], [ZZ(3)]], (3, 1), ZZ) + result = DomainMatrix([[ZZ(2)], [ZZ(0)], [ZZ(-1)]], (3, 1), ZZ) + den = ZZ(-1) + _check_solve_den(A, b, result, den) + + A = DomainMatrix([[ZZ(2)], [ZZ(2)]], (2, 1), ZZ) + b = DomainMatrix([[ZZ(3)], [ZZ(3)]], (2, 1), ZZ) + result = DomainMatrix([[ZZ(3)]], (1, 1), ZZ) + den = ZZ(2) + _check_solve_den(A, b, result, den) + + +def test_DomainMatrix_solve_den_charpoly(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + A1 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMNonSquareMatrixError, lambda: A1.solve_den_charpoly(b)) + b1 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A.solve_den_charpoly(b1)) + bq = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + raises(DMDomainError, lambda: A.solve_den_charpoly(bq)) + + +def test_DomainMatrix_solve_den_charpoly_check(): + # Test check + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(2), ZZ(4)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(3)]], (2, 1), ZZ) + raises(DMNonInvertibleMatrixError, lambda: A.solve_den_charpoly(b)) + adjAb = DomainMatrix([[ZZ(-2)], [ZZ(1)]], (2, 1), ZZ) + assert A.adjugate() * b == adjAb + assert A.solve_den_charpoly(b, check=False) == (adjAb, ZZ(0)) + + +def test_DomainMatrix_solve_den_errors(): + A = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMShapeError, lambda: A.solve_den(b)) + raises(DMShapeError, lambda: A.solve_den_rref(b)) + + A = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + b = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A.solve_den(b)) + raises(DMShapeError, lambda: A.solve_den_rref(b)) + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + b1 = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + raises(DMShapeError, lambda: A.solve_den(b1)) + + A = DomainMatrix([[ZZ(2)]], (1, 1), ZZ) + b = DomainMatrix([[ZZ(2)]], (1, 1), ZZ) + raises(DMBadInputError, lambda: A.solve_den(b1, method='invalid')) + + A = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMNonSquareMatrixError, lambda: A.solve_den_charpoly(b)) + + +def test_DomainMatrix_solve_den_rref_underdetermined(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(1), ZZ(2)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(1)]], (2, 1), ZZ) + raises(DMNonInvertibleMatrixError, lambda: A.solve_den(b)) + raises(DMNonInvertibleMatrixError, lambda: A.solve_den_rref(b)) + + +def test_DomainMatrix_adj_poly_det(): + A = DM([[ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], ZZ) + p, detA = A.adj_poly_det() + assert p == [ZZ(1), ZZ(-15), ZZ(-18)] + assert A.adjugate() == p[0]*A**2 + p[1]*A**1 + p[2]*A**0 == A.eval_poly(p) + assert A.det() == detA + + A = DM([[ZZ(1), ZZ(2), ZZ(3)], + [ZZ(7), ZZ(8), ZZ(9)]], ZZ) + raises(DMNonSquareMatrixError, lambda: A.adj_poly_det()) + + +def test_DomainMatrix_inv_den(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + den = ZZ(-2) + result = DomainMatrix([[ZZ(4), ZZ(-2)], [ZZ(-3), ZZ(1)]], (2, 2), ZZ) + assert A.inv_den() == (result, den) + + +def test_DomainMatrix_adjugate(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + result = DomainMatrix([[ZZ(4), ZZ(-2)], [ZZ(-3), ZZ(1)]], (2, 2), ZZ) + assert A.adjugate() == result + + +def test_DomainMatrix_adj_det(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + adjA = DomainMatrix([[ZZ(4), ZZ(-2)], [ZZ(-3), ZZ(1)]], (2, 2), ZZ) + assert A.adj_det() == (adjA, ZZ(-2)) + + +def test_DomainMatrix_lu(): + A = DomainMatrix([], (0, 0), QQ) + assert A.lu() == (A, A, []) + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + L = DomainMatrix([[QQ(1), QQ(0)], [QQ(3), QQ(1)]], (2, 2), QQ) + U = DomainMatrix([[QQ(1), QQ(2)], [QQ(0), QQ(-2)]], (2, 2), QQ) + swaps = [] + assert A.lu() == (L, U, swaps) + + A = DomainMatrix([[QQ(0), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + L = DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + U = DomainMatrix([[QQ(3), QQ(4)], [QQ(0), QQ(2)]], (2, 2), QQ) + swaps = [(0, 1)] + assert A.lu() == (L, U, swaps) + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(2), QQ(4)]], (2, 2), QQ) + L = DomainMatrix([[QQ(1), QQ(0)], [QQ(2), QQ(1)]], (2, 2), QQ) + U = DomainMatrix([[QQ(1), QQ(2)], [QQ(0), QQ(0)]], (2, 2), QQ) + swaps = [] + assert A.lu() == (L, U, swaps) + + A = DomainMatrix([[QQ(0), QQ(2)], [QQ(0), QQ(4)]], (2, 2), QQ) + L = DomainMatrix([[QQ(1), QQ(0)], [QQ(0), QQ(1)]], (2, 2), QQ) + U = DomainMatrix([[QQ(0), QQ(2)], [QQ(0), QQ(4)]], (2, 2), QQ) + swaps = [] + assert A.lu() == (L, U, swaps) + + A = DomainMatrix([[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]], (2, 3), QQ) + L = DomainMatrix([[QQ(1), QQ(0)], [QQ(4), QQ(1)]], (2, 2), QQ) + U = DomainMatrix([[QQ(1), QQ(2), QQ(3)], [QQ(0), QQ(-3), QQ(-6)]], (2, 3), QQ) + swaps = [] + assert A.lu() == (L, U, swaps) + + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]], (3, 2), QQ) + L = DomainMatrix([ + [QQ(1), QQ(0), QQ(0)], + [QQ(3), QQ(1), QQ(0)], + [QQ(5), QQ(2), QQ(1)]], (3, 3), QQ) + U = DomainMatrix([[QQ(1), QQ(2)], [QQ(0), QQ(-2)], [QQ(0), QQ(0)]], (3, 2), QQ) + swaps = [] + assert A.lu() == (L, U, swaps) + + A = [[1, 0, 0, 0], [0, 0, 0, 0], [0, 0, 1, 1], [0, 0, 1, 2]] + L = [[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 1, 1]] + U = [[1, 0, 0, 0], [0, 0, 0, 0], [0, 0, 1, 1], [0, 0, 0, 1]] + to_dom = lambda rows, dom: [[dom(e) for e in row] for row in rows] + A = DomainMatrix(to_dom(A, QQ), (4, 4), QQ) + L = DomainMatrix(to_dom(L, QQ), (4, 4), QQ) + U = DomainMatrix(to_dom(U, QQ), (4, 4), QQ) + assert A.lu() == (L, U, []) + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + raises(DMNotAField, lambda: A.lu()) + + +def test_DomainMatrix_lu_solve(): + # Base case + A = b = x = DomainMatrix([], (0, 0), QQ) + assert A.lu_solve(b) == x + + # Basic example + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + x = DomainMatrix([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + assert A.lu_solve(b) == x + + # Example with swaps + A = DomainMatrix([[QQ(0), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + x = DomainMatrix([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + assert A.lu_solve(b) == x + + # Non-invertible + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(2), QQ(4)]], (2, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)]], (2, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: A.lu_solve(b)) + + # Overdetermined, consistent + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]], (3, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)], [QQ(3)]], (3, 1), QQ) + x = DomainMatrix([[QQ(0)], [QQ(1, 2)]], (2, 1), QQ) + assert A.lu_solve(b) == x + + # Overdetermined, inconsistent + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]], (3, 2), QQ) + b = DomainMatrix([[QQ(1)], [QQ(2)], [QQ(4)]], (3, 1), QQ) + raises(DMNonInvertibleMatrixError, lambda: A.lu_solve(b)) + + # Underdetermined + A = DomainMatrix([[QQ(1), QQ(2)]], (1, 2), QQ) + b = DomainMatrix([[QQ(1)]], (1, 1), QQ) + raises(NotImplementedError, lambda: A.lu_solve(b)) + + # Non-field + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + b = DomainMatrix([[ZZ(1)], [ZZ(2)]], (2, 1), ZZ) + raises(DMNotAField, lambda: A.lu_solve(b)) + + # Shape mismatch + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + b = DomainMatrix([[QQ(1), QQ(2)]], (1, 2), QQ) + raises(DMShapeError, lambda: A.lu_solve(b)) + + +def test_DomainMatrix_charpoly(): + A = DomainMatrix([], (0, 0), ZZ) + p = [ZZ(1)] + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + A = DomainMatrix([[1]], (1, 1), ZZ) + p = [ZZ(1), ZZ(-1)] + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + p = [ZZ(1), ZZ(-5), ZZ(-2)] + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + A = DomainMatrix([[ZZ(1), ZZ(2), ZZ(3)], [ZZ(4), ZZ(5), ZZ(6)], [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + p = [ZZ(1), ZZ(-15), ZZ(-18), ZZ(0)] + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + A = DomainMatrix([[ZZ(0), ZZ(1), ZZ(0)], + [ZZ(1), ZZ(0), ZZ(1)], + [ZZ(0), ZZ(1), ZZ(0)]], (3, 3), ZZ) + p = [ZZ(1), ZZ(0), ZZ(-2), ZZ(0)] + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + A = DM([[17, 0, 30, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [69, 0, 0, 0, 0, 86, 0, 0, 0, 0], + [23, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 13, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 32, 0, 0], + [ 0, 0, 0, 0, 37, 67, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]], ZZ) + p = ZZ.map([1, -17, -2070, 0, -771420, 0, 0, 0, 0, 0, 0]) + assert A.charpoly() == p + assert A.to_sparse().charpoly() == p + + Ans = DomainMatrix([[QQ(1), QQ(2)]], (1, 2), QQ) + raises(DMNonSquareMatrixError, lambda: Ans.charpoly()) + + +def test_DomainMatrix_charpoly_factor_list(): + A = DomainMatrix([], (0, 0), ZZ) + assert A.charpoly_factor_list() == [] + + A = DM([[1]], ZZ) + assert A.charpoly_factor_list() == [ + ([ZZ(1), ZZ(-1)], 1) + ] + + A = DM([[1, 2], [3, 4]], ZZ) + assert A.charpoly_factor_list() == [ + ([ZZ(1), ZZ(-5), ZZ(-2)], 1) + ] + + A = DM([[1, 2, 0], [3, 4, 0], [0, 0, 1]], ZZ) + assert A.charpoly_factor_list() == [ + ([ZZ(1), ZZ(-1)], 1), + ([ZZ(1), ZZ(-5), ZZ(-2)], 1) + ] + + +def test_DomainMatrix_eye(): + A = DomainMatrix.eye(3, QQ) + assert A.rep == SDM.eye((3, 3), QQ) + assert A.shape == (3, 3) + assert A.domain == QQ + + +def test_DomainMatrix_zeros(): + A = DomainMatrix.zeros((1, 2), QQ) + assert A.rep == SDM.zeros((1, 2), QQ) + assert A.shape == (1, 2) + assert A.domain == QQ + + +def test_DomainMatrix_ones(): + A = DomainMatrix.ones((2, 3), QQ) + if GROUND_TYPES != 'flint': + assert A.rep == DDM.ones((2, 3), QQ) + else: + assert A.rep == SDM.ones((2, 3), QQ).to_dfm() + assert A.shape == (2, 3) + assert A.domain == QQ + + +def test_DomainMatrix_diag(): + A = DomainMatrix({0:{0:ZZ(2)}, 1:{1:ZZ(3)}}, (2, 2), ZZ) + assert DomainMatrix.diag([ZZ(2), ZZ(3)], ZZ) == A + + A = DomainMatrix({0:{0:ZZ(2)}, 1:{1:ZZ(3)}}, (3, 4), ZZ) + assert DomainMatrix.diag([ZZ(2), ZZ(3)], ZZ, (3, 4)) == A + + +def test_DomainMatrix_hstack(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + C = DomainMatrix([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + + AB = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(5), ZZ(6)], + [ZZ(3), ZZ(4), ZZ(7), ZZ(8)]], (2, 4), ZZ) + ABC = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(5), ZZ(6), ZZ(9), ZZ(10)], + [ZZ(3), ZZ(4), ZZ(7), ZZ(8), ZZ(11), ZZ(12)]], (2, 6), ZZ) + assert A.hstack(B) == AB + assert A.hstack(B, C) == ABC + + +def test_DomainMatrix_vstack(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + B = DomainMatrix([[ZZ(5), ZZ(6)], [ZZ(7), ZZ(8)]], (2, 2), ZZ) + C = DomainMatrix([[ZZ(9), ZZ(10)], [ZZ(11), ZZ(12)]], (2, 2), ZZ) + + AB = DomainMatrix([ + [ZZ(1), ZZ(2)], + [ZZ(3), ZZ(4)], + [ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8)]], (4, 2), ZZ) + ABC = DomainMatrix([ + [ZZ(1), ZZ(2)], + [ZZ(3), ZZ(4)], + [ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8)], + [ZZ(9), ZZ(10)], + [ZZ(11), ZZ(12)]], (6, 2), ZZ) + assert A.vstack(B) == AB + assert A.vstack(B, C) == ABC + + +def test_DomainMatrix_applyfunc(): + A = DomainMatrix([[ZZ(1), ZZ(2)]], (1, 2), ZZ) + B = DomainMatrix([[ZZ(2), ZZ(4)]], (1, 2), ZZ) + assert A.applyfunc(lambda x: 2*x) == B + + +def test_DomainMatrix_scalarmul(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + lamda = DomainScalar(QQ(3)/QQ(2), QQ) + assert A * lamda == DomainMatrix([[QQ(3, 2), QQ(3)], [QQ(9, 2), QQ(6)]], (2, 2), QQ) + assert A * 2 == DomainMatrix([[ZZ(2), ZZ(4)], [ZZ(6), ZZ(8)]], (2, 2), ZZ) + assert 2 * A == DomainMatrix([[ZZ(2), ZZ(4)], [ZZ(6), ZZ(8)]], (2, 2), ZZ) + assert A * DomainScalar(ZZ(0), ZZ) == DomainMatrix({}, (2, 2), ZZ) + assert A * DomainScalar(ZZ(1), ZZ) == A + + raises(TypeError, lambda: A * 1.5) + + +def test_DomainMatrix_truediv(): + A = DomainMatrix.from_Matrix(Matrix([[1, 2], [3, 4]])) + lamda = DomainScalar(QQ(3)/QQ(2), QQ) + assert A / lamda == DomainMatrix({0: {0: QQ(2, 3), 1: QQ(4, 3)}, 1: {0: QQ(2), 1: QQ(8, 3)}}, (2, 2), QQ) + b = DomainScalar(ZZ(1), ZZ) + assert A / b == DomainMatrix({0: {0: QQ(1), 1: QQ(2)}, 1: {0: QQ(3), 1: QQ(4)}}, (2, 2), QQ) + + assert A / 1 == DomainMatrix({0: {0: QQ(1), 1: QQ(2)}, 1: {0: QQ(3), 1: QQ(4)}}, (2, 2), QQ) + assert A / 2 == DomainMatrix({0: {0: QQ(1, 2), 1: QQ(1)}, 1: {0: QQ(3, 2), 1: QQ(2)}}, (2, 2), QQ) + + raises(ZeroDivisionError, lambda: A / 0) + raises(TypeError, lambda: A / 1.5) + raises(ZeroDivisionError, lambda: A / DomainScalar(ZZ(0), ZZ)) + + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A.to_field() / 2 == DomainMatrix([[QQ(1, 2), QQ(1)], [QQ(3, 2), QQ(2)]], (2, 2), QQ) + assert A / 2 == DomainMatrix([[QQ(1, 2), QQ(1)], [QQ(3, 2), QQ(2)]], (2, 2), QQ) + assert A.to_field() / QQ(2,3) == DomainMatrix([[QQ(3, 2), QQ(3)], [QQ(9, 2), QQ(6)]], (2, 2), QQ) + + +def test_DomainMatrix_getitem(): + dM = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + + assert dM[1:,:-2] == DomainMatrix([[ZZ(4)], [ZZ(7)]], (2, 1), ZZ) + assert dM[2,:-2] == DomainMatrix([[ZZ(7)]], (1, 1), ZZ) + assert dM[:-2,:-2] == DomainMatrix([[ZZ(1)]], (1, 1), ZZ) + assert dM[:-1,0:2] == DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(4), ZZ(5)]], (2, 2), ZZ) + assert dM[:, -1] == DomainMatrix([[ZZ(3)], [ZZ(6)], [ZZ(9)]], (3, 1), ZZ) + assert dM[-1, :] == DomainMatrix([[ZZ(7), ZZ(8), ZZ(9)]], (1, 3), ZZ) + assert dM[::-1, :] == DomainMatrix([ + [ZZ(7), ZZ(8), ZZ(9)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(1), ZZ(2), ZZ(3)]], (3, 3), ZZ) + + raises(IndexError, lambda: dM[4, :-2]) + raises(IndexError, lambda: dM[:-2, 4]) + + assert dM[1, 2] == DomainScalar(ZZ(6), ZZ) + assert dM[-2, 2] == DomainScalar(ZZ(6), ZZ) + assert dM[1, -2] == DomainScalar(ZZ(5), ZZ) + assert dM[-1, -3] == DomainScalar(ZZ(7), ZZ) + + raises(IndexError, lambda: dM[3, 3]) + raises(IndexError, lambda: dM[1, 4]) + raises(IndexError, lambda: dM[-1, -4]) + + dM = DomainMatrix({0: {0: ZZ(1)}}, (10, 10), ZZ) + assert dM[5, 5] == DomainScalar(ZZ(0), ZZ) + assert dM[0, 0] == DomainScalar(ZZ(1), ZZ) + + dM = DomainMatrix({1: {0: 1}}, (2,1), ZZ) + assert dM[0:, 0] == DomainMatrix({1: {0: 1}}, (2, 1), ZZ) + raises(IndexError, lambda: dM[3, 0]) + + dM = DomainMatrix({2: {2: ZZ(1)}, 4: {4: ZZ(1)}}, (5, 5), ZZ) + assert dM[:2,:2] == DomainMatrix({}, (2, 2), ZZ) + assert dM[2:,2:] == DomainMatrix({0: {0: 1}, 2: {2: 1}}, (3, 3), ZZ) + assert dM[3:,3:] == DomainMatrix({1: {1: 1}}, (2, 2), ZZ) + assert dM[2:, 6:] == DomainMatrix({}, (3, 0), ZZ) + + +def test_DomainMatrix_getitem_sympy(): + dM = DomainMatrix({2: {2: ZZ(2)}, 4: {4: ZZ(1)}}, (5, 5), ZZ) + val1 = dM.getitem_sympy(0, 0) + assert val1 is S.Zero + val2 = dM.getitem_sympy(2, 2) + assert val2 == 2 and isinstance(val2, Integer) + + +def test_DomainMatrix_extract(): + dM1 = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(3)], + [ZZ(4), ZZ(5), ZZ(6)], + [ZZ(7), ZZ(8), ZZ(9)]], (3, 3), ZZ) + dM2 = DomainMatrix([ + [ZZ(1), ZZ(3)], + [ZZ(7), ZZ(9)]], (2, 2), ZZ) + assert dM1.extract([0, 2], [0, 2]) == dM2 + assert dM1.to_sparse().extract([0, 2], [0, 2]) == dM2.to_sparse() + assert dM1.extract([0, -1], [0, -1]) == dM2 + assert dM1.to_sparse().extract([0, -1], [0, -1]) == dM2.to_sparse() + + dM3 = DomainMatrix([ + [ZZ(1), ZZ(2), ZZ(2)], + [ZZ(4), ZZ(5), ZZ(5)], + [ZZ(4), ZZ(5), ZZ(5)]], (3, 3), ZZ) + assert dM1.extract([0, 1, 1], [0, 1, 1]) == dM3 + assert dM1.to_sparse().extract([0, 1, 1], [0, 1, 1]) == dM3.to_sparse() + + empty = [ + ([], [], (0, 0)), + ([1], [], (1, 0)), + ([], [1], (0, 1)), + ] + for rows, cols, size in empty: + assert dM1.extract(rows, cols) == DomainMatrix.zeros(size, ZZ).to_dense() + assert dM1.to_sparse().extract(rows, cols) == DomainMatrix.zeros(size, ZZ) + + dM = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + bad_indices = [([2], [0]), ([0], [2]), ([-3], [0]), ([0], [-3])] + for rows, cols in bad_indices: + raises(IndexError, lambda: dM.extract(rows, cols)) + raises(IndexError, lambda: dM.to_sparse().extract(rows, cols)) + + +def test_DomainMatrix_setitem(): + dM = DomainMatrix({2: {2: ZZ(1)}, 4: {4: ZZ(1)}}, (5, 5), ZZ) + dM[2, 2] = ZZ(2) + assert dM == DomainMatrix({2: {2: ZZ(2)}, 4: {4: ZZ(1)}}, (5, 5), ZZ) + def setitem(i, j, val): + dM[i, j] = val + raises(TypeError, lambda: setitem(2, 2, QQ(1, 2))) + raises(NotImplementedError, lambda: setitem(slice(1, 2), 2, ZZ(1))) + + +def test_DomainMatrix_pickling(): + import pickle + dM = DomainMatrix({2: {2: ZZ(1)}, 4: {4: ZZ(1)}}, (5, 5), ZZ) + assert pickle.loads(pickle.dumps(dM)) == dM + dM = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert pickle.loads(pickle.dumps(dM)) == dM + + +def test_DomainMatrix_fflu(): + A = DM([[1, 2], [3, 4]], ZZ) + P, L, D, U = A.fflu() + assert P.shape == A.shape + assert L.shape == A.shape + assert D.shape == A.shape + assert U.shape == A.shape + assert P == DM([[1, 0], [0, 1]], ZZ) + assert L == DM([[1, 0], [3, -2]], ZZ) + assert D == DM([[1, 0], [0, -2]], ZZ) + assert U == DM([[1, 2], [0, -2]], ZZ) + di, d = D.inv_den() + assert P.matmul(A).rmul(d) == L.matmul(di).matmul(U) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainscalar.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainscalar.py new file mode 100644 index 0000000000000000000000000000000000000000..8c507caf079cc62ba23ba171a50d0d27c98eb6d9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_domainscalar.py @@ -0,0 +1,153 @@ +from sympy.testing.pytest import raises + +from sympy.core.symbol import S +from sympy.polys import ZZ, QQ +from sympy.polys.matrices.domainscalar import DomainScalar +from sympy.polys.matrices.domainmatrix import DomainMatrix + + +def test_DomainScalar___new__(): + raises(TypeError, lambda: DomainScalar(ZZ(1), QQ)) + raises(TypeError, lambda: DomainScalar(ZZ(1), 1)) + + +def test_DomainScalar_new(): + A = DomainScalar(ZZ(1), ZZ) + B = A.new(ZZ(4), ZZ) + assert B == DomainScalar(ZZ(4), ZZ) + + +def test_DomainScalar_repr(): + A = DomainScalar(ZZ(1), ZZ) + assert repr(A) in {'1', 'mpz(1)'} + + +def test_DomainScalar_from_sympy(): + expr = S(1) + B = DomainScalar.from_sympy(expr) + assert B == DomainScalar(ZZ(1), ZZ) + + +def test_DomainScalar_to_sympy(): + B = DomainScalar(ZZ(1), ZZ) + expr = B.to_sympy() + assert expr.is_Integer and expr == 1 + + +def test_DomainScalar_to_domain(): + A = DomainScalar(ZZ(1), ZZ) + B = A.to_domain(QQ) + assert B == DomainScalar(QQ(1), QQ) + + +def test_DomainScalar_convert_to(): + A = DomainScalar(ZZ(1), ZZ) + B = A.convert_to(QQ) + assert B == DomainScalar(QQ(1), QQ) + + +def test_DomainScalar_unify(): + A = DomainScalar(ZZ(1), ZZ) + B = DomainScalar(QQ(2), QQ) + A, B = A.unify(B) + assert A.domain == B.domain == QQ + + +def test_DomainScalar_add(): + A = DomainScalar(ZZ(1), ZZ) + B = DomainScalar(QQ(2), QQ) + assert A + B == DomainScalar(QQ(3), QQ) + + raises(TypeError, lambda: A + 1.5) + +def test_DomainScalar_sub(): + A = DomainScalar(ZZ(1), ZZ) + B = DomainScalar(QQ(2), QQ) + assert A - B == DomainScalar(QQ(-1), QQ) + + raises(TypeError, lambda: A - 1.5) + +def test_DomainScalar_mul(): + A = DomainScalar(ZZ(1), ZZ) + B = DomainScalar(QQ(2), QQ) + dm = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + assert A * B == DomainScalar(QQ(2), QQ) + assert A * dm == dm + assert B * 2 == DomainScalar(QQ(4), QQ) + + raises(TypeError, lambda: A * 1.5) + + +def test_DomainScalar_floordiv(): + A = DomainScalar(ZZ(-5), ZZ) + B = DomainScalar(QQ(2), QQ) + assert A // B == DomainScalar(QQ(-5, 2), QQ) + C = DomainScalar(ZZ(2), ZZ) + assert A // C == DomainScalar(ZZ(-3), ZZ) + + raises(TypeError, lambda: A // 1.5) + + +def test_DomainScalar_mod(): + A = DomainScalar(ZZ(5), ZZ) + B = DomainScalar(QQ(2), QQ) + assert A % B == DomainScalar(QQ(0), QQ) + C = DomainScalar(ZZ(2), ZZ) + assert A % C == DomainScalar(ZZ(1), ZZ) + + raises(TypeError, lambda: A % 1.5) + + +def test_DomainScalar_divmod(): + A = DomainScalar(ZZ(5), ZZ) + B = DomainScalar(QQ(2), QQ) + assert divmod(A, B) == (DomainScalar(QQ(5, 2), QQ), DomainScalar(QQ(0), QQ)) + C = DomainScalar(ZZ(2), ZZ) + assert divmod(A, C) == (DomainScalar(ZZ(2), ZZ), DomainScalar(ZZ(1), ZZ)) + + raises(TypeError, lambda: divmod(A, 1.5)) + + +def test_DomainScalar_pow(): + A = DomainScalar(ZZ(-5), ZZ) + B = A**(2) + assert B == DomainScalar(ZZ(25), ZZ) + + raises(TypeError, lambda: A**(1.5)) + + +def test_DomainScalar_pos(): + A = DomainScalar(QQ(2), QQ) + B = DomainScalar(QQ(2), QQ) + assert +A == B + + +def test_DomainScalar_neg(): + A = DomainScalar(QQ(2), QQ) + B = DomainScalar(QQ(-2), QQ) + assert -A == B + + +def test_DomainScalar_eq(): + A = DomainScalar(QQ(2), QQ) + assert A == A + B = DomainScalar(ZZ(-5), ZZ) + assert A != B + C = DomainScalar(ZZ(2), ZZ) + assert A != C + D = [1] + assert A != D + + +def test_DomainScalar_isZero(): + A = DomainScalar(ZZ(0), ZZ) + assert A.is_zero() == True + B = DomainScalar(ZZ(1), ZZ) + assert B.is_zero() == False + + +def test_DomainScalar_isOne(): + A = DomainScalar(ZZ(1), ZZ) + assert A.is_one() == True + B = DomainScalar(ZZ(0), ZZ) + assert B.is_one() == False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_eigen.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_eigen.py new file mode 100644 index 0000000000000000000000000000000000000000..70482eab686d5b4e1c45d552f5eccb5bdaa9e1ed --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_eigen.py @@ -0,0 +1,90 @@ +""" +Tests for the sympy.polys.matrices.eigen module +""" + +from sympy.core.singleton import S +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.matrices.dense import Matrix + +from sympy.polys.agca.extensions import FiniteExtension +from sympy.polys.domains import QQ +from sympy.polys.polytools import Poly +from sympy.polys.rootoftools import CRootOf +from sympy.polys.matrices.domainmatrix import DomainMatrix + +from sympy.polys.matrices.eigen import dom_eigenvects, dom_eigenvects_to_sympy + + +def test_dom_eigenvects_rational(): + # Rational eigenvalues + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(1), QQ(2)]], (2, 2), QQ) + rational_eigenvects = [ + (QQ, QQ(3), 1, DomainMatrix([[QQ(1), QQ(1)]], (1, 2), QQ)), + (QQ, QQ(0), 1, DomainMatrix([[QQ(-2), QQ(1)]], (1, 2), QQ)), + ] + assert dom_eigenvects(A) == (rational_eigenvects, []) + + # Test converting to Expr: + sympy_eigenvects = [ + (S(3), 1, [Matrix([1, 1])]), + (S(0), 1, [Matrix([-2, 1])]), + ] + assert dom_eigenvects_to_sympy(rational_eigenvects, [], Matrix) == sympy_eigenvects + + +def test_dom_eigenvects_algebraic(): + # Algebraic eigenvalues + A = DomainMatrix([[QQ(1), QQ(2)], [QQ(3), QQ(4)]], (2, 2), QQ) + Avects = dom_eigenvects(A) + + # Extract the dummy to build the expected result: + lamda = Avects[1][0][1].gens[0] + irreducible = Poly(lamda**2 - 5*lamda - 2, lamda, domain=QQ) + K = FiniteExtension(irreducible) + KK = K.from_sympy + algebraic_eigenvects = [ + (K, irreducible, 1, DomainMatrix([[KK((lamda-4)/3), KK(1)]], (1, 2), K)), + ] + assert Avects == ([], algebraic_eigenvects) + + # Test converting to Expr: + sympy_eigenvects = [ + (S(5)/2 - sqrt(33)/2, 1, [Matrix([[-sqrt(33)/6 - S(1)/2], [1]])]), + (S(5)/2 + sqrt(33)/2, 1, [Matrix([[-S(1)/2 + sqrt(33)/6], [1]])]), + ] + assert dom_eigenvects_to_sympy([], algebraic_eigenvects, Matrix) == sympy_eigenvects + + +def test_dom_eigenvects_rootof(): + # Algebraic eigenvalues + A = DomainMatrix([ + [0, 0, 0, 0, -1], + [1, 0, 0, 0, 1], + [0, 1, 0, 0, 0], + [0, 0, 1, 0, 0], + [0, 0, 0, 1, 0]], (5, 5), QQ) + Avects = dom_eigenvects(A) + + # Extract the dummy to build the expected result: + lamda = Avects[1][0][1].gens[0] + irreducible = Poly(lamda**5 - lamda + 1, lamda, domain=QQ) + K = FiniteExtension(irreducible) + KK = K.from_sympy + algebraic_eigenvects = [ + (K, irreducible, 1, + DomainMatrix([ + [KK(lamda**4-1), KK(lamda**3), KK(lamda**2), KK(lamda), KK(1)] + ], (1, 5), K)), + ] + assert Avects == ([], algebraic_eigenvects) + + # Test converting to Expr (slow): + l0, l1, l2, l3, l4 = [CRootOf(lamda**5 - lamda + 1, i) for i in range(5)] + sympy_eigenvects = [ + (l0, 1, [Matrix([-1 + l0**4, l0**3, l0**2, l0, 1])]), + (l1, 1, [Matrix([-1 + l1**4, l1**3, l1**2, l1, 1])]), + (l2, 1, [Matrix([-1 + l2**4, l2**3, l2**2, l2, 1])]), + (l3, 1, [Matrix([-1 + l3**4, l3**3, l3**2, l3, 1])]), + (l4, 1, [Matrix([-1 + l4**4, l4**3, l4**2, l4, 1])]), + ] + assert dom_eigenvects_to_sympy([], algebraic_eigenvects, Matrix) == sympy_eigenvects diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_fflu.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_fflu.py new file mode 100644 index 0000000000000000000000000000000000000000..0a4676ce0c3ee2d495b7011ddc48db8c8c40648b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_fflu.py @@ -0,0 +1,301 @@ +from sympy.polys.matrices import DomainMatrix, DM +from sympy.polys.domains import ZZ, QQ +from sympy import Matrix +import pytest + + +FFLU_EXAMPLES = [ + ( + 'zz_2x3', + DM([[1, 2, 3], [4, 5, 6]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[1, 0], [4, -3]], ZZ), + DM([[1, 0], [0, -3]], ZZ), + DM([[1, 2, 3], [0, -3, -6]], ZZ), + ), + + ( + 'zz_2x2', + DM([[4, 3], [6, 3]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[1, 0], [6, -6]], ZZ), + DM([[4, 0], [0, -3]], ZZ), + DM([[4, 3], [0, -3]], ZZ), + ), + + ( + 'zz_3x2', + DM([[1, 2], [3, 4], [5, 6]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [3, 1, 0], [5, 2, 1]], ZZ), + DM([[1, 0], [0, -2]], ZZ), + DM([[1, 2], [0, -2], [0, 0]], ZZ), + ), + + ( + 'zz_3x3', + DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [4, 1, 0], [7, 2, 1]], ZZ), + DM([[1, 0, 0], [0, -3, 0], [0, 0, 0]], ZZ), + DM([[1, 2, 3], [0, -3, -6], [0, 0, 0]], ZZ), + ), + + ( + 'zz_zero', + DM([[0, 0, 0], [0, 0, 0], [0, 0, 0]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[0, 0, 0], [0, 0, 0], [0, 0, 0]], ZZ), + DM([[0, 0, 0], [0, 0, 0], [0, 0, 0]], ZZ), + ), + + ( + 'zz_empty', + DM([], ZZ), + DM([], ZZ), + DM([], ZZ), + DM([], ZZ), + DM([], ZZ), + ), + + ( + 'zz_empty_0x2', + DomainMatrix([], (0, 2), ZZ), + DomainMatrix([], (0, 0), ZZ), + DomainMatrix([], (0, 0), ZZ), + DomainMatrix([], (0, 0), ZZ), + DomainMatrix([], (0, 2), ZZ) + ), + + ( + + 'zz_empty_2x0', + DomainMatrix([[], []], (2, 0), ZZ), + DomainMatrix.eye((2, 2), ZZ), + DomainMatrix.eye((2, 2), ZZ), + DomainMatrix.eye((2, 2), ZZ), + DomainMatrix([[], []], (2, 0), ZZ) + + ), + + ( + 'zz_negative', + DM([[-1, -2], [-3, -4]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[-1, 0], [-3, -2]], ZZ), + DM([[-1, 0], [0, 2]], ZZ), + DM([[-1, -2], [0, -2]], ZZ), + ), + + ( + 'zz_mixed_signs', + DM([[1, -2], [-3, 4]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[1, 0], [-3, 1]], ZZ), + DM([[1, 0], [0, -2]], ZZ), + DM([[1, -2], [0, -2]], ZZ), + ), + + ( + 'zz_upper_triangular', + DM([[1, 2, 3], [0, 4, 5], [0, 0, 6]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [0, 4, 0], [0, 0, 24]], ZZ), + DM([[1, 0, 0], [0, 4, 0], [0, 0, 96]], ZZ), + DM([[1, 2, 3], [0, 4, 5], [0, 0, 24]], ZZ), + ), + + ( + 'zz_lower_triangular', + DM([[1, 0, 0], [2, 3, 0], [4, 5, 6]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [2, 3, 0], [4, 5, 18]], ZZ), + DM([[1, 0, 0], [0, 3, 0], [0, 0, 54]], ZZ), + DM([[1, 0, 0], [0, 3, 0], [0, 0, 18]], ZZ), + ), + + ( + 'zz_diagonal', + DM([[2, 0, 0], [0, 3, 0], [0, 0, 4]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[2, 0, 0], [0, 6, 0], [0, 0, 24]], ZZ), + DM([[2, 0, 0], [0, 12, 0], [0, 0, 144]], ZZ), + DM([[2, 0, 0], [0, 6, 0], [0, 0, 24]], ZZ) + + ), + + ( + 'rank_deficient_3x3', + DM([[1, 2, 3], [2, 4, 6], [3, 6, 9]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[1, 0, 0], [2, 1, 0], [3, 0, 1]], ZZ), + DM([[1, 0, 0], [0, 0, 0], [0, 0, 0]], ZZ), + DM([[1, 2, 3], [0, 0, 0], [0, 0, 0]], ZZ), + ), + + ( + 'zz_1x1', + DM([[5]], ZZ), + DM([[1]], ZZ), + DM([[5]], ZZ), + DM([[5]], ZZ), + DM([[5]], ZZ), + ), + + ( + 'zz_nx1_2rows', + DM([[81], [54]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[81, 0], [54, 81]], ZZ), + DM([[81, 0], [0, 81]], ZZ), + DM([[81], [0]], ZZ), + ), + + ( + 'zz_nx2_3rows', + DM([[2, 7], [7, 45], [25, 84]], ZZ), + DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]], ZZ), + DM([[2, 0, 0], [7, 82, 0], [25, 41, 41]], ZZ), + DM([[2, 0, 0], [0, 82, 0], [0, 0, 41]], ZZ), + DM([[2, 7], [0, 82], [0, 0]], ZZ), + ), + + ( + + 'zz_1x2', + DM([[0, 28]], ZZ), + DM([[1]], ZZ), + DM([[28]], ZZ), + DM([[28]], ZZ), + DM([[0, 28]], ZZ) + ), + + ( + 'zz_nx3_4rows', + DM([[84, 30, 9], [20, 59, 13], [53, 46, 81], [63, 48, 29]], ZZ), + DM([[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 0, 1]], ZZ), + DM([[84, 0, 0, 0], [20, 365904, 0, 0], [53, 303411, 303411, 0], [63, 303411, 303411, 303411]], ZZ), + DM([[84, 0, 0, 0], [0, 365904, 0, 0], [0, 0, 1321658316, 0], [0, 0, 0, 303411]], ZZ), + DM([[84, 30, 9], [0, 365904, 13], [0, 0, 1321658316], [0, 0, 0]], ZZ), + ), + + ( + 'fflu_row_swap', + DM([[0, 1, 2], [3, 4, 5], [6, 7, 8]], ZZ), + DM([[0, 1, 0], [1, 0, 0], [0, 0, 1]], ZZ), + DM([[3, 0, 0], [0, 3, 0], [6, -3, 1]], ZZ), + DM([[3, 0, 0], [0, 9, 0], [0, 0, 3]], ZZ), + DM([[3, 4, 5], [0, 3, 6], [0, 0, 0]], ZZ) + ), +] + + +def _check_fflu(A, P, L, D, U): + P_field = P.to_field().to_dense() + L_field = L.to_field().to_dense() + D_field = D.to_field().to_dense() + U_field = U.to_field().to_dense() + m, n = A.shape + assert P_field.shape == (m, m) + assert L_field.shape == (m, m) + assert D_field.shape == (m, m) + assert U_field.shape == (m, n) + assert L_field.is_lower + assert D_field.is_diagonal + di, d = D.inv_den() + assert P.matmul(A).rmul(d) == L.matmul(di).matmul(U) + assert U_field.is_upper + + +def _to_DM(A, ans): + if isinstance(A, DomainMatrix): + return A + elif isinstance(A, Matrix): + return A.to_DM(ans.domain) + return DomainMatrix(A.to_list(), A.shape, A.domain) + + +def _check_fflu_result(result, A, P_ans, L_ans, D_ans, U_ans): + P, L, D, U = result + P = _to_DM(P, P_ans) + L = _to_DM(L, L_ans) + D = _to_DM(D, D_ans) + U = _to_DM(U, U_ans) + A = _to_DM(A, P_ans) + m, n = A.shape + assert P.shape == (m, m) + assert L.shape == (m, m) + assert D.shape == (m, m) + assert U.shape == (m, n) + assert L.is_lower + assert D.is_diagonal + di, d = D.inv_den() + assert P.matmul(A).rmul(d) == L.matmul(di).matmul(U) + assert U.is_upper + + +@pytest.mark.parametrize('name, A, P_ans, L_ans, D_ans, U_ans', FFLU_EXAMPLES) +def test_dm_dense_fflu(name, A, P_ans, L_ans, D_ans, U_ans): + A = A.to_dense() + _check_fflu_result(A.fflu(), A, P_ans, L_ans, D_ans, U_ans) + + +@pytest.mark.parametrize('name, A, P_ans, L_ans, D_ans, U_ans', FFLU_EXAMPLES) +def test_dm_sparse_fflu(name, A, P_ans, L_ans, D_ans, U_ans): + A = A.to_sparse() + _check_fflu_result(A.fflu(), A, P_ans, L_ans, D_ans, U_ans) + + +@pytest.mark.parametrize('name, A, P_ans, L_ans, D_ans, U_ans', FFLU_EXAMPLES) +def test_ddm_fflu(name, A, P_ans, L_ans, D_ans, U_ans): + A = A.to_ddm() + _check_fflu_result(A.fflu(), A, P_ans, L_ans, D_ans, U_ans) + + +@pytest.mark.parametrize('name, A, P_ans, L_ans, D_ans, U_ans', FFLU_EXAMPLES) +def test_sdm_fflu(name, A, P_ans, L_ans, D_ans, U_ans): + A = A.to_sdm() + _check_fflu_result(A.fflu(), A, P_ans, L_ans, D_ans, U_ans) + + +@pytest.mark.parametrize('name, A, P_ans, L_ans, D_ans, U_ans', FFLU_EXAMPLES) +def test_dfm_fflu(name, A, P_ans, L_ans, D_ans, U_ans): + pytest.importorskip('flint') + if A.domain not in (ZZ, QQ) and not A.domain.is_FF: + pytest.skip("Domain not supported by DFM") + A = A.to_dfm() + _check_fflu_result(A.fflu(), A, P_ans, L_ans, D_ans, U_ans) + + +def test_fflu_empty_matrix(): + A = DomainMatrix([], (0, 0), ZZ) + P, L, D, U = A.fflu() + assert P.shape == (0, 0) + assert L.shape == (0, 0) + assert D.shape == (0, 0) + assert U.shape == (0, 0) + + +def test_fflu_properties(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]], (2, 2), ZZ) + P, L, D, U = A.fflu() + assert P.shape == (2, 2) + assert L.shape == (2, 2) + assert D.shape == (2, 2) + assert U.shape == (2, 2) + assert L.is_lower + assert U.is_upper + assert D.is_diagonal + di, d = D.inv_den() + assert P.matmul(A).rmul(d) == L.matmul(di).matmul(U) + + +def test_fflu_rank_deficient(): + A = DomainMatrix([[ZZ(1), ZZ(2)], [ZZ(2), ZZ(4)]], (2, 2), ZZ) + P, L, D, U = A.fflu() + assert P.shape == (2, 2) + assert L.shape == (2, 2) + assert D.shape == (2, 2) + assert U.shape == (2, 2) + assert U.getitem_sympy(1, 1) == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_inverse.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_inverse.py new file mode 100644 index 0000000000000000000000000000000000000000..47c82799324518bd7d1cc2405ade0aa0a5a4f6e9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_inverse.py @@ -0,0 +1,193 @@ +from sympy import ZZ, Matrix +from sympy.polys.matrices import DM, DomainMatrix +from sympy.polys.matrices.dense import ddm_iinv +from sympy.polys.matrices.exceptions import DMNonInvertibleMatrixError +from sympy.matrices.exceptions import NonInvertibleMatrixError + +import pytest +from sympy.testing.pytest import raises +from sympy.core.numbers import all_close + +from sympy.abc import x + + +# Examples are given as adjugate matrix and determinant adj_det should match +# these exactly but inv_den only matches after cancel_denom. + + +INVERSE_EXAMPLES = [ + + ( + 'zz_1', + DomainMatrix([], (0, 0), ZZ), + DomainMatrix([], (0, 0), ZZ), + ZZ(1), + ), + + ( + 'zz_2', + DM([[2]], ZZ), + DM([[1]], ZZ), + ZZ(2), + ), + + ( + 'zz_3', + DM([[2, 0], + [0, 2]], ZZ), + DM([[2, 0], + [0, 2]], ZZ), + ZZ(4), + ), + + ( + 'zz_4', + DM([[1, 2], + [3, 4]], ZZ), + DM([[ 4, -2], + [-3, 1]], ZZ), + ZZ(-2), + ), + + ( + 'zz_5', + DM([[2, 2, 0], + [0, 2, 2], + [0, 0, 2]], ZZ), + DM([[4, -4, 4], + [0, 4, -4], + [0, 0, 4]], ZZ), + ZZ(8), + ), + + ( + 'zz_6', + DM([[1, 2, 3], + [4, 5, 6], + [7, 8, 9]], ZZ), + DM([[-3, 6, -3], + [ 6, -12, 6], + [-3, 6, -3]], ZZ), + ZZ(0), + ), +] + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_Matrix_inv(name, A, A_inv, den): + + def _check(**kwargs): + if den != 0: + assert A.inv(**kwargs) == A_inv + else: + raises(NonInvertibleMatrixError, lambda: A.inv(**kwargs)) + + K = A.domain + A = A.to_Matrix() + A_inv = A_inv.to_Matrix() / K.to_sympy(den) + _check() + for method in ['GE', 'LU', 'ADJ', 'CH', 'LDL', 'QR']: + _check(method=method) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_dm_inv_den(name, A, A_inv, den): + if den != 0: + A_inv_f, den_f = A.inv_den() + assert A_inv_f.cancel_denom(den_f) == A_inv.cancel_denom(den) + else: + raises(DMNonInvertibleMatrixError, lambda: A.inv_den()) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_dm_inv(name, A, A_inv, den): + A = A.to_field() + if den != 0: + A_inv = A_inv.to_field() / den + assert A.inv() == A_inv + else: + raises(DMNonInvertibleMatrixError, lambda: A.inv()) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_ddm_inv(name, A, A_inv, den): + A = A.to_field().to_ddm() + if den != 0: + A_inv = (A_inv.to_field() / den).to_ddm() + assert A.inv() == A_inv + else: + raises(DMNonInvertibleMatrixError, lambda: A.inv()) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_sdm_inv(name, A, A_inv, den): + A = A.to_field().to_sdm() + if den != 0: + A_inv = (A_inv.to_field() / den).to_sdm() + assert A.inv() == A_inv + else: + raises(DMNonInvertibleMatrixError, lambda: A.inv()) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_dense_ddm_iinv(name, A, A_inv, den): + A = A.to_field().to_ddm().copy() + K = A.domain + A_result = A.copy() + if den != 0: + A_inv = (A_inv.to_field() / den).to_ddm() + ddm_iinv(A_result, A, K) + assert A_result == A_inv + else: + raises(DMNonInvertibleMatrixError, lambda: ddm_iinv(A_result, A, K)) + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_Matrix_adjugate(name, A, A_inv, den): + A = A.to_Matrix() + A_inv = A_inv.to_Matrix() + assert A.adjugate() == A_inv + for method in ["bareiss", "berkowitz", "bird", "laplace", "lu"]: + assert A.adjugate(method=method) == A_inv + + +@pytest.mark.parametrize('name, A, A_inv, den', INVERSE_EXAMPLES) +def test_dm_adj_det(name, A, A_inv, den): + assert A.adj_det() == (A_inv, den) + + +def test_inverse_inexact(): + + M = Matrix([[x-0.3, -0.06, -0.22], + [-0.46, x-0.48, -0.41], + [-0.14, -0.39, x-0.64]]) + + Mn = Matrix([[1.0*x**2 - 1.12*x + 0.1473, 0.06*x + 0.0474, 0.22*x - 0.081], + [0.46*x - 0.237, 1.0*x**2 - 0.94*x + 0.1612, 0.41*x - 0.0218], + [0.14*x + 0.1122, 0.39*x - 0.1086, 1.0*x**2 - 0.78*x + 0.1164]]) + + d = 1.0*x**3 - 1.42*x**2 + 0.4249*x - 0.0546540000000002 + + Mi = Mn / d + + M_dm = M.to_DM() + M_dmd = M_dm.to_dense() + M_dm_num, M_dm_den = M_dm.inv_den() + M_dmd_num, M_dmd_den = M_dmd.inv_den() + + # XXX: We don't check M_dm().to_field().inv() which currently uses division + # and produces a more complicate result from gcd cancellation failing. + # DomainMatrix.inv() over RR(x) should be changed to clear denominators and + # use DomainMatrix.inv_den(). + + Minvs = [ + M.inv(), + (M_dm_num.to_field() / M_dm_den).to_Matrix(), + (M_dmd_num.to_field() / M_dmd_den).to_Matrix(), + M_dm_num.to_Matrix() / M_dm_den.as_expr(), + M_dmd_num.to_Matrix() / M_dmd_den.as_expr(), + ] + + for Minv in Minvs: + for Mi1, Mi2 in zip(Minv.flat(), Mi.flat()): + assert all_close(Mi2, Mi1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_linsolve.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_linsolve.py new file mode 100644 index 0000000000000000000000000000000000000000..25300ef2cb4792e4424c9c15c0bbbc313ce062e6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_linsolve.py @@ -0,0 +1,112 @@ +# +# test_linsolve.py +# +# Test the internal implementation of linsolve. +# + +from sympy.testing.pytest import raises + +from sympy.core.numbers import I +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.abc import x, y, z + +from sympy.polys.matrices.linsolve import _linsolve +from sympy.polys.solvers import PolyNonlinearError + + +def test__linsolve(): + assert _linsolve([], [x]) == {x:x} + assert _linsolve([S.Zero], [x]) == {x:x} + assert _linsolve([x-1,x-2], [x]) is None + assert _linsolve([x-1], [x]) == {x:1} + assert _linsolve([x-1, y], [x, y]) == {x:1, y:S.Zero} + assert _linsolve([2*I], [x]) is None + raises(PolyNonlinearError, lambda: _linsolve([x*(1 + x)], [x])) + + +def test__linsolve_float(): + + # This should give the exact answer: + eqs = [ + y - x, + y - 0.0216 * x + ] + # Should _linsolve return floats here? + sol = {x:0, y:0} + assert _linsolve(eqs, (x, y)) == sol + + # Other cases should be close to eps + + def all_close(sol1, sol2, eps=1e-15): + close = lambda a, b: abs(a - b) < eps + assert sol1.keys() == sol2.keys() + return all(close(sol1[s], sol2[s]) for s in sol1) + + eqs = [ + 0.8*x + 0.8*z + 0.2, + 0.9*x + 0.7*y + 0.2*z + 0.9, + 0.7*x + 0.2*y + 0.2*z + 0.5 + ] + sol_exact = {x:-29/42, y:-11/21, z:37/84} + sol_linsolve = _linsolve(eqs, [x,y,z]) + assert all_close(sol_exact, sol_linsolve) + + eqs = [ + 0.9*x + 0.3*y + 0.4*z + 0.6, + 0.6*x + 0.9*y + 0.1*z + 0.7, + 0.4*x + 0.6*y + 0.9*z + 0.5 + ] + sol_exact = {x:-88/175, y:-46/105, z:-1/25} + sol_linsolve = _linsolve(eqs, [x,y,z]) + assert all_close(sol_exact, sol_linsolve) + + eqs = [ + 0.4*x + 0.3*y + 0.6*z + 0.7, + 0.4*x + 0.3*y + 0.9*z + 0.9, + 0.7*x + 0.9*y, + ] + sol_exact = {x:-9/5, y:7/5, z:-2/3} + sol_linsolve = _linsolve(eqs, [x,y,z]) + assert all_close(sol_exact, sol_linsolve) + + eqs = [ + x*(0.7 + 0.6*I) + y*(0.4 + 0.7*I) + z*(0.9 + 0.1*I) + 0.5, + 0.2*I*x + 0.2*I*y + z*(0.9 + 0.2*I) + 0.1, + x*(0.9 + 0.7*I) + y*(0.9 + 0.7*I) + z*(0.9 + 0.4*I) + 0.4, + ] + sol_exact = { + x:-6157/7995 - 411/5330*I, + y:8519/15990 + 1784/7995*I, + z:-34/533 + 107/1599*I, + } + sol_linsolve = _linsolve(eqs, [x,y,z]) + assert all_close(sol_exact, sol_linsolve) + + # XXX: This system for x and y over RR(z) is problematic. + # + # eqs = [ + # x*(0.2*z + 0.9) + y*(0.5*z + 0.8) + 0.6, + # 0.1*x*z + y*(0.1*z + 0.6) + 0.9, + # ] + # + # linsolve(eqs, [x, y]) + # The solution for x comes out as + # + # -3.9e-5*z**2 - 3.6e-5*z - 8.67361737988404e-20 + # x = ---------------------------------------------- + # 3.0e-6*z**3 - 1.3e-5*z**2 - 5.4e-5*z + # + # The 8e-20 in the numerator should be zero which would allow z to cancel + # from top and bottom. It should be possible to avoid this somehow because + # the inverse of the matrix only has a quadratic factor (the determinant) + # in the denominator. + + +def test__linsolve_deprecated(): + raises(PolyNonlinearError, lambda: + _linsolve([Eq(x**2, x**2 + y)], [x, y])) + raises(PolyNonlinearError, lambda: + _linsolve([(x + y)**2 - x**2], [x])) + raises(PolyNonlinearError, lambda: + _linsolve([Eq((x + y)**2, x**2)], [x])) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_lll.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_lll.py new file mode 100644 index 0000000000000000000000000000000000000000..2cf91a00703532f02d763656d6117018fbc496cf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_lll.py @@ -0,0 +1,145 @@ +from sympy.polys.domains import ZZ, QQ +from sympy.polys.matrices import DM +from sympy.polys.matrices.domainmatrix import DomainMatrix +from sympy.polys.matrices.exceptions import DMRankError, DMValueError, DMShapeError, DMDomainError +from sympy.polys.matrices.lll import _ddm_lll, ddm_lll, ddm_lll_transform +from sympy.testing.pytest import raises + + +def test_lll(): + normal_test_data = [ + ( + DM([[1, 0, 0, 0, -20160], + [0, 1, 0, 0, 33768], + [0, 0, 1, 0, 39578], + [0, 0, 0, 1, 47757]], ZZ), + DM([[10, -3, -2, 8, -4], + [3, -9, 8, 1, -11], + [-3, 13, -9, -3, -9], + [-12, -7, -11, 9, -1]], ZZ) + ), + ( + DM([[20, 52, 3456], + [14, 31, -1], + [34, -442, 0]], ZZ), + DM([[14, 31, -1], + [188, -101, -11], + [236, 13, 3443]], ZZ) + ), + ( + DM([[34, -1, -86, 12], + [-54, 34, 55, 678], + [23, 3498, 234, 6783], + [87, 49, 665, 11]], ZZ), + DM([[34, -1, -86, 12], + [291, 43, 149, 83], + [-54, 34, 55, 678], + [-189, 3077, -184, -223]], ZZ) + ) + ] + delta = QQ(5, 6) + for basis_dm, reduced_dm in normal_test_data: + reduced = _ddm_lll(basis_dm.rep.to_ddm(), delta=delta)[0] + assert reduced == reduced_dm.rep.to_ddm() + + reduced = ddm_lll(basis_dm.rep.to_ddm(), delta=delta) + assert reduced == reduced_dm.rep.to_ddm() + + reduced, transform = _ddm_lll(basis_dm.rep.to_ddm(), delta=delta, return_transform=True) + assert reduced == reduced_dm.rep.to_ddm() + assert transform.matmul(basis_dm.rep.to_ddm()) == reduced_dm.rep.to_ddm() + + reduced, transform = ddm_lll_transform(basis_dm.rep.to_ddm(), delta=delta) + assert reduced == reduced_dm.rep.to_ddm() + assert transform.matmul(basis_dm.rep.to_ddm()) == reduced_dm.rep.to_ddm() + + reduced = basis_dm.rep.lll(delta=delta) + assert reduced == reduced_dm.rep + + reduced, transform = basis_dm.rep.lll_transform(delta=delta) + assert reduced == reduced_dm.rep + assert transform.matmul(basis_dm.rep) == reduced_dm.rep + + reduced = basis_dm.rep.to_sdm().lll(delta=delta) + assert reduced == reduced_dm.rep.to_sdm() + + reduced, transform = basis_dm.rep.to_sdm().lll_transform(delta=delta) + assert reduced == reduced_dm.rep.to_sdm() + assert transform.matmul(basis_dm.rep.to_sdm()) == reduced_dm.rep.to_sdm() + + reduced = basis_dm.lll(delta=delta) + assert reduced == reduced_dm + + reduced, transform = basis_dm.lll_transform(delta=delta) + assert reduced == reduced_dm + assert transform.matmul(basis_dm) == reduced_dm + + +def test_lll_linear_dependent(): + linear_dependent_test_data = [ + DM([[0, -1, -2, -3], + [1, 0, -1, -2], + [2, 1, 0, -1], + [3, 2, 1, 0]], ZZ), + DM([[1, 0, 0, 1], + [0, 1, 0, 1], + [0, 0, 1, 1], + [1, 2, 3, 6]], ZZ), + DM([[3, -5, 1], + [4, 6, 0], + [10, -4, 2]], ZZ) + ] + for not_basis in linear_dependent_test_data: + raises(DMRankError, lambda: _ddm_lll(not_basis.rep.to_ddm())) + raises(DMRankError, lambda: ddm_lll(not_basis.rep.to_ddm())) + raises(DMRankError, lambda: not_basis.rep.lll()) + raises(DMRankError, lambda: not_basis.rep.to_sdm().lll()) + raises(DMRankError, lambda: not_basis.lll()) + raises(DMRankError, lambda: _ddm_lll(not_basis.rep.to_ddm(), return_transform=True)) + raises(DMRankError, lambda: ddm_lll_transform(not_basis.rep.to_ddm())) + raises(DMRankError, lambda: not_basis.rep.lll_transform()) + raises(DMRankError, lambda: not_basis.rep.to_sdm().lll_transform()) + raises(DMRankError, lambda: not_basis.lll_transform()) + + +def test_lll_wrong_delta(): + dummy_matrix = DomainMatrix.ones((3, 3), ZZ) + for wrong_delta in [QQ(-1, 4), QQ(0, 1), QQ(1, 4), QQ(1, 1), QQ(100, 1)]: + raises(DMValueError, lambda: _ddm_lll(dummy_matrix.rep, delta=wrong_delta)) + raises(DMValueError, lambda: ddm_lll(dummy_matrix.rep, delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.rep.lll(delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.rep.to_sdm().lll(delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.lll(delta=wrong_delta)) + raises(DMValueError, lambda: _ddm_lll(dummy_matrix.rep, delta=wrong_delta, return_transform=True)) + raises(DMValueError, lambda: ddm_lll_transform(dummy_matrix.rep, delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.rep.lll_transform(delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.rep.to_sdm().lll_transform(delta=wrong_delta)) + raises(DMValueError, lambda: dummy_matrix.lll_transform(delta=wrong_delta)) + + +def test_lll_wrong_shape(): + wrong_shape_matrix = DomainMatrix.ones((4, 3), ZZ) + raises(DMShapeError, lambda: _ddm_lll(wrong_shape_matrix.rep)) + raises(DMShapeError, lambda: ddm_lll(wrong_shape_matrix.rep)) + raises(DMShapeError, lambda: wrong_shape_matrix.rep.lll()) + raises(DMShapeError, lambda: wrong_shape_matrix.rep.to_sdm().lll()) + raises(DMShapeError, lambda: wrong_shape_matrix.lll()) + raises(DMShapeError, lambda: _ddm_lll(wrong_shape_matrix.rep, return_transform=True)) + raises(DMShapeError, lambda: ddm_lll_transform(wrong_shape_matrix.rep)) + raises(DMShapeError, lambda: wrong_shape_matrix.rep.lll_transform()) + raises(DMShapeError, lambda: wrong_shape_matrix.rep.to_sdm().lll_transform()) + raises(DMShapeError, lambda: wrong_shape_matrix.lll_transform()) + + +def test_lll_wrong_domain(): + wrong_domain_matrix = DomainMatrix.ones((3, 3), QQ) + raises(DMDomainError, lambda: _ddm_lll(wrong_domain_matrix.rep)) + raises(DMDomainError, lambda: ddm_lll(wrong_domain_matrix.rep)) + raises(DMDomainError, lambda: wrong_domain_matrix.rep.lll()) + raises(DMDomainError, lambda: wrong_domain_matrix.rep.to_sdm().lll()) + raises(DMDomainError, lambda: wrong_domain_matrix.lll()) + raises(DMDomainError, lambda: _ddm_lll(wrong_domain_matrix.rep, return_transform=True)) + raises(DMDomainError, lambda: ddm_lll_transform(wrong_domain_matrix.rep)) + raises(DMDomainError, lambda: wrong_domain_matrix.rep.lll_transform()) + raises(DMDomainError, lambda: wrong_domain_matrix.rep.to_sdm().lll_transform()) + raises(DMDomainError, lambda: wrong_domain_matrix.lll_transform()) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_normalforms.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_normalforms.py new file mode 100644 index 0000000000000000000000000000000000000000..542d9064aea204759158578a4bfbbf5acbb06db3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_normalforms.py @@ -0,0 +1,156 @@ +from sympy.testing.pytest import raises + +from sympy.core.symbol import Symbol +from sympy.polys.matrices.normalforms import ( + invariant_factors, + smith_normal_form, + smith_normal_decomp, + is_smith_normal_form, + hermite_normal_form, + _hermite_normal_form, + _hermite_normal_form_modulo_D +) +from sympy.polys.domains import ZZ, QQ +from sympy.polys.matrices import DomainMatrix, DM +from sympy.polys.matrices.exceptions import DMDomainError, DMShapeError + + +def test_is_smith_normal_form(): + + snf_examples = [ + DM([[0, 0], [0, 0]], ZZ), + DM([[1, 0], [0, 0]], ZZ), + DM([[1, 0], [0, 1]], ZZ), + DM([[1, 0], [0, 2]], ZZ), + ] + + non_snf_examples = [ + DM([[0, 1], [0, 0]], ZZ), + DM([[0, 0], [0, 1]], ZZ), + DM([[2, 0], [0, 3]], ZZ), + ] + + for m in snf_examples: + assert is_smith_normal_form(m) is True + + for m in non_snf_examples: + assert is_smith_normal_form(m) is False + + +def test_smith_normal(): + + m = DM([ + [12, 6, 4, 8], + [3, 9, 6, 12], + [2, 16, 14, 28], + [20, 10, 10, 20]], ZZ) + + smf = DM([ + [1, 0, 0, 0], + [0, 10, 0, 0], + [0, 0, 30, 0], + [0, 0, 0, 0]], ZZ) + + s = DM([ + [0, 1, -1, 0], + [1, -4, 0, 0], + [0, -2, 3, 0], + [-2, 2, -1, 1]], ZZ) + + t = DM([ + [1, 1, 10, 0], + [0, -1, -2, 0], + [0, 1, 3, -2], + [0, 0, 0, 1]], ZZ) + + assert smith_normal_form(m).to_dense() == smf + assert smith_normal_decomp(m) == (smf, s, t) + assert is_smith_normal_form(smf) + assert smf == s * m * t + + m00 = DomainMatrix.zeros((0, 0), ZZ).to_dense() + m01 = DomainMatrix.zeros((0, 1), ZZ).to_dense() + m10 = DomainMatrix.zeros((1, 0), ZZ).to_dense() + i11 = DM([[1]], ZZ) + + assert smith_normal_form(m00) == m00.to_sparse() + assert smith_normal_form(m01) == m01.to_sparse() + assert smith_normal_form(m10) == m10.to_sparse() + assert smith_normal_form(i11) == i11.to_sparse() + + assert smith_normal_decomp(m00) == (m00, m00, m00) + assert smith_normal_decomp(m01) == (m01, m00, i11) + assert smith_normal_decomp(m10) == (m10, i11, m00) + assert smith_normal_decomp(i11) == (i11, i11, i11) + + x = Symbol('x') + m = DM([[x-1, 1, -1], + [ 0, x, -1], + [ 0, -1, x]], QQ[x]) + dx = m.domain.gens[0] + assert invariant_factors(m) == (1, dx-1, dx**2-1) + + zr = DomainMatrix([], (0, 2), ZZ) + zc = DomainMatrix([[], []], (2, 0), ZZ) + assert smith_normal_form(zr).to_dense() == zr + assert smith_normal_form(zc).to_dense() == zc + + assert smith_normal_form(DM([[2, 4]], ZZ)).to_dense() == DM([[2, 0]], ZZ) + assert smith_normal_form(DM([[0, -2]], ZZ)).to_dense() == DM([[2, 0]], ZZ) + assert smith_normal_form(DM([[0], [-2]], ZZ)).to_dense() == DM([[2], [0]], ZZ) + + assert smith_normal_decomp(DM([[0, -2]], ZZ)) == ( + DM([[2, 0]], ZZ), DM([[-1]], ZZ), DM([[0, 1], [1, 0]], ZZ) + ) + assert smith_normal_decomp(DM([[0], [-2]], ZZ)) == ( + DM([[2], [0]], ZZ), DM([[0, -1], [1, 0]], ZZ), DM([[1]], ZZ) + ) + + m = DM([[3, 0, 0, 0], [0, 0, 0, 0], [0, 0, 2, 0]], ZZ) + snf = DM([[1, 0, 0, 0], [0, 6, 0, 0], [0, 0, 0, 0]], ZZ) + s = DM([[1, 0, 1], [2, 0, 3], [0, 1, 0]], ZZ) + t = DM([[1, -2, 0, 0], [0, 0, 0, 1], [-1, 3, 0, 0], [0, 0, 1, 0]], ZZ) + + assert smith_normal_form(m).to_dense() == snf + assert smith_normal_decomp(m) == (snf, s, t) + assert is_smith_normal_form(snf) + assert snf == s * m * t + + raises(ValueError, lambda: smith_normal_form(DM([[1]], ZZ[x]))) + + +def test_hermite_normal(): + m = DM([[2, 7, 17, 29, 41], [3, 11, 19, 31, 43], [5, 13, 23, 37, 47]], ZZ) + hnf = DM([[1, 0, 0], [0, 2, 1], [0, 0, 1]], ZZ) + assert hermite_normal_form(m) == hnf + assert hermite_normal_form(m, D=ZZ(2)) == hnf + assert hermite_normal_form(m, D=ZZ(2), check_rank=True) == hnf + + m = m.transpose() + hnf = DM([[37, 0, 19], [222, -6, 113], [48, 0, 25], [0, 2, 1], [0, 0, 1]], ZZ) + assert hermite_normal_form(m) == hnf + raises(DMShapeError, lambda: _hermite_normal_form_modulo_D(m, ZZ(96))) + raises(DMDomainError, lambda: _hermite_normal_form_modulo_D(m, QQ(96))) + + m = DM([[8, 28, 68, 116, 164], [3, 11, 19, 31, 43], [5, 13, 23, 37, 47]], ZZ) + hnf = DM([[4, 0, 0], [0, 2, 1], [0, 0, 1]], ZZ) + assert hermite_normal_form(m) == hnf + assert hermite_normal_form(m, D=ZZ(8)) == hnf + assert hermite_normal_form(m, D=ZZ(8), check_rank=True) == hnf + + m = DM([[10, 8, 6, 30, 2], [45, 36, 27, 18, 9], [5, 4, 3, 2, 1]], ZZ) + hnf = DM([[26, 2], [0, 9], [0, 1]], ZZ) + assert hermite_normal_form(m) == hnf + + m = DM([[2, 7], [0, 0], [0, 0]], ZZ) + hnf = DM([[1], [0], [0]], ZZ) + assert hermite_normal_form(m) == hnf + + m = DM([[-2, 1], [0, 1]], ZZ) + hnf = DM([[2, 1], [0, 1]], ZZ) + assert hermite_normal_form(m) == hnf + + m = DomainMatrix([[QQ(1)]], (1, 1), QQ) + raises(DMDomainError, lambda: hermite_normal_form(m)) + raises(DMDomainError, lambda: _hermite_normal_form(m)) + raises(DMDomainError, lambda: _hermite_normal_form_modulo_D(m, ZZ(1))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_nullspace.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_nullspace.py new file mode 100644 index 0000000000000000000000000000000000000000..dbb025b7dc9dff31bc97d86e175147ffede5a7e3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_nullspace.py @@ -0,0 +1,209 @@ +from sympy import ZZ, Matrix +from sympy.polys.matrices import DM, DomainMatrix +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.sdm import SDM + +import pytest + +zeros = lambda shape, K: DomainMatrix.zeros(shape, K).to_dense() +eye = lambda n, K: DomainMatrix.eye(n, K).to_dense() + + +# +# DomainMatrix.nullspace can have a divided answer or can return an undivided +# uncanonical answer. The uncanonical answer is not unique but we can make it +# unique by making it primitive (remove gcd). The tests here all show the +# primitive form. We test two things: +# +# A.nullspace().primitive()[1] == answer. +# A.nullspace(divide_last=True) == _divide_last(answer). +# +# The nullspace as returned by DomainMatrix and related classes is the +# transpose of the nullspace as returned by Matrix. Matrix returns a list of +# of column vectors whereas DomainMatrix returns a matrix whose rows are the +# nullspace vectors. +# + + +NULLSPACE_EXAMPLES = [ + + ( + 'zz_1', + DM([[ 1, 2, 3]], ZZ), + DM([[-2, 1, 0], + [-3, 0, 1]], ZZ), + ), + + ( + 'zz_2', + zeros((0, 0), ZZ), + zeros((0, 0), ZZ), + ), + + ( + 'zz_3', + zeros((2, 0), ZZ), + zeros((0, 0), ZZ), + ), + + ( + 'zz_4', + zeros((0, 2), ZZ), + eye(2, ZZ), + ), + + ( + 'zz_5', + zeros((2, 2), ZZ), + eye(2, ZZ), + ), + + ( + 'zz_6', + DM([[1, 2], + [3, 4]], ZZ), + zeros((0, 2), ZZ), + ), + + ( + 'zz_7', + DM([[1, 1], + [1, 1]], ZZ), + DM([[-1, 1]], ZZ), + ), + + ( + 'zz_8', + DM([[1], + [1]], ZZ), + zeros((0, 1), ZZ), + ), + + ( + 'zz_9', + DM([[1, 1]], ZZ), + DM([[-1, 1]], ZZ), + ), + + ( + 'zz_10', + DM([[0, 0, 0, 0, 0, 1, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 0, 1, 0, 0, 0], + [0, 1, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 1, 0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 1, 0, 0, 0, 0, 1]], ZZ), + DM([[ 0, 0, 1, 0, 0, 0, 0, 0, 0, 0], + [-1, 0, 0, 0, 0, 0, 1, 0, 0, 0], + [ 0, -1, 0, 0, 0, 0, 0, 1, 0, 0], + [ 0, 0, 0, -1, 0, 0, 0, 0, 1, 0], + [ 0, 0, 0, 0, -1, 0, 0, 0, 0, 1]], ZZ), + ), + +] + + +def _to_DM(A, ans): + """Convert the answer to DomainMatrix.""" + if isinstance(A, DomainMatrix): + return A.to_dense() + elif isinstance(A, DDM): + return DomainMatrix(list(A), A.shape, A.domain).to_dense() + elif isinstance(A, SDM): + return DomainMatrix(dict(A), A.shape, A.domain).to_dense() + else: + assert False # pragma: no cover + + +def _divide_last(null): + """Normalize the nullspace by the rightmost non-zero entry.""" + null = null.to_field() + + if null.is_zero_matrix: + return null + + rows = [] + for i in range(null.shape[0]): + for j in reversed(range(null.shape[1])): + if null[i, j]: + rows.append(null[i, :] / null[i, j]) + break + else: + assert False # pragma: no cover + + return DomainMatrix.vstack(*rows) + + +def _check_primitive(null, null_ans): + """Check that the primitive of the answer matches.""" + null = _to_DM(null, null_ans) + cont, null_prim = null.primitive() + assert null_prim == null_ans + + +def _check_divided(null, null_ans): + """Check the divided answer.""" + null = _to_DM(null, null_ans) + null_ans_norm = _divide_last(null_ans) + assert null == null_ans_norm + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_Matrix_nullspace(name, A, A_null): + A = A.to_Matrix() + + A_null_cols = A.nullspace() + + # We have to patch up the case where the nullspace is empty + if A_null_cols: + A_null_found = Matrix.hstack(*A_null_cols) + else: + A_null_found = Matrix.zeros(A.cols, 0) + + A_null_found = A_null_found.to_DM().to_field().to_dense() + + # The Matrix result is the transpose of DomainMatrix result. + A_null_found = A_null_found.transpose() + + _check_divided(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_dm_dense_nullspace(name, A, A_null): + A = A.to_field().to_dense() + A_null_found = A.nullspace(divide_last=True) + _check_divided(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_dm_sparse_nullspace(name, A, A_null): + A = A.to_field().to_sparse() + A_null_found = A.nullspace(divide_last=True) + _check_divided(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_ddm_nullspace(name, A, A_null): + A = A.to_field().to_ddm() + A_null_found, _ = A.nullspace() + _check_divided(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_sdm_nullspace(name, A, A_null): + A = A.to_field().to_sdm() + A_null_found, _ = A.nullspace() + _check_divided(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_dm_dense_nullspace_fracfree(name, A, A_null): + A = A.to_dense() + A_null_found = A.nullspace() + _check_primitive(A_null_found, A_null) + + +@pytest.mark.parametrize('name, A, A_null', NULLSPACE_EXAMPLES) +def test_dm_sparse_nullspace_fracfree(name, A, A_null): + A = A.to_sparse() + A_null_found = A.nullspace() + _check_primitive(A_null_found, A_null) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_rref.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_rref.py new file mode 100644 index 0000000000000000000000000000000000000000..49def18c8132c0537540163a96bf6cf323c5a85c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_rref.py @@ -0,0 +1,737 @@ +from sympy import ZZ, QQ, ZZ_I, EX, Matrix, eye, zeros, symbols +from sympy.polys.matrices import DM, DomainMatrix +from sympy.polys.matrices.dense import ddm_irref_den, ddm_irref +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.sdm import SDM, sdm_irref, sdm_rref_den + +import pytest + + +# +# The dense and sparse implementations of rref_den are ddm_irref_den and +# sdm_irref_den. These can give results that differ by some factor and also +# give different results if the order of the rows is changed. The tests below +# show all results on lowest terms as should be returned by cancel_denom. +# +# The EX domain is also a case where the dense and sparse implementations +# can give results in different forms: the results should be equivalent but +# are not canonical because EX does not have a canonical form. +# + + +a, b, c, d = symbols('a, b, c, d') + + +qq_large_1 = DM([ +[ (1,2), (1,3), (1,5), (1,7), (1,11), (1,13), (1,17), (1,19), (1,23), (1,29), (1,31)], +[ (1,37), (1,41), (1,43), (1,47), (1,53), (1,59), (1,61), (1,67), (1,71), (1,73), (1,79)], +[ (1,83), (1,89), (1,97),(1,101),(1,103),(1,107),(1,109),(1,113),(1,127),(1,131),(1,137)], +[(1,139),(1,149),(1,151),(1,157),(1,163),(1,167),(1,173),(1,179),(1,181),(1,191),(1,193)], +[(1,197),(1,199),(1,211),(1,223),(1,227),(1,229),(1,233),(1,239),(1,241),(1,251),(1,257)], +[(1,263),(1,269),(1,271),(1,277),(1,281),(1,283),(1,293),(1,307),(1,311),(1,313),(1,317)], +[(1,331),(1,337),(1,347),(1,349),(1,353),(1,359),(1,367),(1,373),(1,379),(1,383),(1,389)], +[(1,397),(1,401),(1,409),(1,419),(1,421),(1,431),(1,433),(1,439),(1,443),(1,449),(1,457)], +[(1,461),(1,463),(1,467),(1,479),(1,487),(1,491),(1,499),(1,503),(1,509),(1,521),(1,523)], +[(1,541),(1,547),(1,557),(1,563),(1,569),(1,571),(1,577),(1,587),(1,593),(1,599),(1,601)], +[(1,607),(1,613),(1,617),(1,619),(1,631),(1,641),(1,643),(1,647),(1,653),(1,659),(1,661)]], + QQ) + +qq_large_2 = qq_large_1 + 10**100 * DomainMatrix.eye(11, QQ) + + +RREF_EXAMPLES = [ + ( + 'zz_1', + DM([[1, 2, 3]], ZZ), + DM([[1, 2, 3]], ZZ), + ZZ(1), + ), + + ( + 'zz_2', + DomainMatrix([], (0, 0), ZZ), + DomainMatrix([], (0, 0), ZZ), + ZZ(1), + ), + + ( + 'zz_3', + DM([[1, 2], + [3, 4]], ZZ), + DM([[1, 0], + [0, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_4', + DM([[1, 0], + [3, 4]], ZZ), + DM([[1, 0], + [0, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_5', + DM([[0, 2], + [3, 4]], ZZ), + DM([[1, 0], + [0, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_6', + DM([[1, 2, 3], + [4, 5, 6], + [7, 8, 9]], ZZ), + DM([[1, 0, -1], + [0, 1, 2], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_7', + DM([[0, 0, 0], + [0, 0, 0], + [1, 0, 0]], ZZ), + DM([[1, 0, 0], + [0, 0, 0], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_8', + DM([[0, 0, 0], + [0, 0, 0], + [0, 0, 0]], ZZ), + DM([[0, 0, 0], + [0, 0, 0], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_9', + DM([[1, 1, 0], + [0, 0, 2], + [0, 0, 0]], ZZ), + DM([[1, 1, 0], + [0, 0, 1], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_10', + DM([[2, 2, 0], + [0, 0, 2], + [0, 0, 0]], ZZ), + DM([[1, 1, 0], + [0, 0, 1], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_11', + DM([[2, 2, 0], + [0, 2, 2], + [0, 0, 2]], ZZ), + DM([[1, 0, 0], + [0, 1, 0], + [0, 0, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_12', + DM([[ 1, 2, 3], + [ 4, 5, 6], + [ 7, 8, 9], + [10, 11, 12]], ZZ), + DM([[1, 0, -1], + [0, 1, 2], + [0, 0, 0], + [0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_13', + DM([[ 1, 2, 3], + [ 4, 5, 6], + [ 7, 8, 9], + [10, 11, 13]], ZZ), + DM([[ 1, 0, 0], + [ 0, 1, 0], + [ 0, 0, 1], + [ 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_14', + DM([[1, 2, 4, 3], + [4, 5, 10, 6], + [7, 8, 16, 9]], ZZ), + DM([[1, 0, 0, -1], + [0, 1, 2, 2], + [0, 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_15', + DM([[1, 2, 4, 3], + [4, 5, 10, 6], + [7, 8, 17, 9]], ZZ), + DM([[1, 0, 0, -1], + [0, 1, 0, 2], + [0, 0, 1, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_16', + DM([[1, 2, 0, 1], + [1, 1, 9, 0]], ZZ), + DM([[1, 0, 18, -1], + [0, 1, -9, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_17', + DM([[1, 1, 1], + [1, 2, 2]], ZZ), + DM([[1, 0, 0], + [0, 1, 1]], ZZ), + ZZ(1), + ), + + ( + # Here the sparse implementation and dense implementation give very + # different denominators: 4061232 and -1765176. + 'zz_18', + DM([[94, 24, 0, 27, 0], + [79, 0, 0, 0, 0], + [85, 16, 71, 81, 0], + [ 0, 0, 72, 77, 0], + [21, 0, 34, 0, 0]], ZZ), + DM([[ 1, 0, 0, 0, 0], + [ 0, 1, 0, 0, 0], + [ 0, 0, 1, 0, 0], + [ 0, 0, 0, 1, 0], + [ 0, 0, 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + # Let's have a denominator that cannot be cancelled. + 'zz_19', + DM([[1, 2, 4], + [4, 5, 6]], ZZ), + DM([[3, 0, -8], + [0, 3, 10]], ZZ), + ZZ(3), + ), + + ( + 'zz_20', + DM([[0, 0, 0, 0, 0], + [0, 0, 0, 0, 0], + [0, 0, 0, 0, 4]], ZZ), + DM([[0, 0, 0, 0, 1], + [0, 0, 0, 0, 0], + [0, 0, 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_21', + DM([[0, 0, 0, 0, 0, 1, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 0, 1, 0, 0, 0], + [0, 1, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 1, 0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 1, 0, 0, 0, 0, 1]], ZZ), + DM([[1, 0, 0, 0, 0, 0, 1, 0, 0, 0], + [0, 1, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 1, 0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 1, 0, 0, 0, 0, 1], + [0, 0, 0, 0, 0, 1, 0, 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_22', + DM([[1, 1, 1, 0, 1], + [1, 1, 0, 1, 0], + [1, 0, 1, 0, 1], + [1, 1, 0, 1, 0], + [1, 0, 0, 0, 0]], ZZ), + DM([[1, 0, 0, 0, 0], + [0, 1, 0, 0, 0], + [0, 0, 1, 0, 1], + [0, 0, 0, 1, 0], + [0, 0, 0, 0, 0]], ZZ), + ZZ(1), + ), + + ( + 'zz_large_1', + DM([ +[ 0, 0, 0, 81, 0, 0, 75, 0, 0, 0, 0, 0, 0, 27, 0, 0, 0, 0, 0, 0], +[ 0, 0, 0, 0, 0, 86, 0, 92, 79, 54, 0, 7, 0, 0, 0, 0, 79, 0, 0, 0], +[89, 54, 81, 0, 0, 20, 0, 0, 0, 0, 0, 0, 51, 0, 94, 0, 0, 77, 0, 0], +[ 0, 0, 0, 96, 0, 0, 0, 0, 0, 0, 0, 0, 48, 29, 0, 0, 5, 0, 32, 0], +[ 0, 70, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 60, 0, 0, 0, 11], +[ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 37, 0, 43, 0, 0], +[ 0, 0, 0, 0, 0, 38, 91, 0, 0, 0, 0, 38, 0, 0, 0, 0, 0, 26, 0, 0], +[69, 0, 0, 0, 0, 0, 94, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 55], +[ 0, 13, 18, 49, 49, 88, 0, 0, 35, 54, 0, 0, 51, 0, 0, 0, 0, 0, 0, 87], +[ 0, 0, 0, 0, 31, 0, 40, 0, 0, 0, 0, 0, 0, 50, 0, 0, 0, 0, 88, 0], +[ 0, 0, 0, 0, 0, 0, 0, 0, 98, 0, 0, 0, 15, 53, 0, 92, 0, 0, 0, 0], +[ 0, 0, 0, 95, 0, 0, 0, 36, 0, 0, 0, 0, 0, 72, 0, 0, 0, 0, 73, 19], +[ 0, 65, 14, 96, 0, 0, 0, 0, 0, 0, 0, 0, 0, 90, 0, 0, 0, 34, 0, 0], +[ 0, 0, 0, 16, 39, 44, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 51, 0, 0], +[ 0, 17, 0, 0, 0, 99, 84, 13, 50, 84, 0, 0, 0, 0, 95, 0, 43, 33, 20, 0], +[79, 0, 17, 52, 99, 12, 69, 0, 98, 0, 68, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[ 0, 0, 0, 82, 0, 44, 0, 0, 0, 97, 0, 0, 0, 0, 0, 10, 0, 0, 31, 0], +[ 0, 0, 21, 0, 67, 0, 0, 0, 0, 0, 4, 0, 50, 0, 0, 0, 33, 0, 0, 0], +[ 0, 0, 0, 0, 9, 42, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 8], +[ 0, 77, 0, 0, 0, 0, 0, 0, 0, 0, 34, 93, 0, 0, 0, 0, 47, 0, 0, 0]], + ZZ), + DM([[1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1]], ZZ), + ZZ(1), + ), + + ( + 'zz_large_2', + DM([ +[ 0, 0, 0, 0, 50, 0, 6, 81, 0, 1, 86, 0, 0, 98, 82, 94, 4, 0, 0, 29], +[ 0, 44, 43, 0, 62, 0, 0, 0, 60, 0, 0, 0, 0, 71, 9, 0, 57, 41, 0, 93], +[ 0, 0, 28, 0, 74, 89, 42, 0, 28, 0, 6, 0, 0, 0, 44, 0, 0, 0, 77, 19], +[ 0, 21, 82, 0, 30, 88, 0, 89, 68, 0, 0, 0, 79, 41, 0, 0, 99, 0, 0, 0], +[31, 0, 0, 0, 19, 64, 0, 0, 79, 0, 5, 0, 72, 10, 60, 32, 64, 59, 0, 24], +[ 0, 0, 0, 0, 0, 57, 0, 94, 0, 83, 20, 0, 0, 9, 31, 0, 49, 26, 58, 0], +[ 0, 65, 56, 31, 64, 0, 0, 0, 0, 0, 0, 52, 85, 0, 0, 0, 0, 51, 0, 0], +[ 0, 35, 0, 0, 0, 69, 0, 0, 64, 0, 0, 0, 0, 70, 0, 0, 90, 0, 75, 76], +[69, 7, 0, 90, 0, 0, 84, 0, 47, 69, 19, 20, 42, 0, 0, 32, 71, 35, 0, 0], +[39, 0, 90, 0, 0, 4, 85, 0, 0, 55, 0, 0, 0, 35, 67, 40, 0, 40, 0, 77], +[98, 63, 0, 71, 0, 50, 0, 2, 61, 0, 38, 0, 0, 0, 0, 75, 0, 40, 33, 56], +[ 0, 73, 0, 64, 0, 38, 0, 35, 61, 0, 0, 52, 0, 7, 0, 51, 0, 0, 0, 34], +[ 0, 0, 28, 0, 34, 5, 63, 45, 14, 42, 60, 16, 76, 54, 99, 0, 28, 30, 0, 0], +[58, 37, 14, 0, 0, 0, 94, 0, 0, 90, 0, 0, 0, 0, 0, 0, 0, 8, 90, 53], +[86, 74, 94, 0, 49, 10, 60, 0, 40, 18, 0, 0, 0, 31, 60, 24, 0, 1, 0, 29], +[53, 0, 0, 97, 0, 0, 58, 0, 0, 39, 44, 47, 0, 0, 0, 12, 50, 0, 0, 11], +[ 4, 0, 92, 10, 28, 0, 0, 89, 0, 0, 18, 54, 23, 39, 0, 2, 0, 48, 0, 92], +[ 0, 0, 90, 77, 95, 33, 0, 0, 49, 22, 39, 0, 0, 0, 0, 0, 0, 40, 0, 0], +[96, 0, 0, 0, 0, 38, 86, 0, 22, 76, 0, 0, 0, 0, 83, 88, 95, 65, 72, 0], +[81, 65, 0, 4, 60, 0, 19, 0, 0, 68, 0, 0, 89, 0, 67, 22, 0, 0, 55, 33]], + ZZ), + DM([ +[1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0], +[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1]], + ZZ), + ZZ(1), + ), + + ( + 'zz_large_3', + DM([ +[62,35,89,58,22,47,30,28,52,72,17,56,80,26,64,21,10,35,24,42,96,32,23,50,92,37,76,94,63,66], +[20,47,96,34,10,98,19,6,29,2,19,92,61,94,38,41,32,9,5,94,31,58,27,41,72,85,61,62,40,46], +[69,26,35,68,25,52,94,13,38,65,81,10,29,15,5,4,13,99,85,0,80,51,60,60,26,77,85,2,87,25], +[99,58,69,15,52,12,18,7,27,56,12,54,21,92,38,95,33,83,28,1,44,8,29,84,92,12,2,25,46,46], +[93,13,55,48,35,87,24,40,23,35,25,32,0,19,0,85,4,79,26,11,46,75,7,96,76,11,7,57,99,75], +[128,85,26,51,161,173,77,78,85,103,123,58,91,147,38,91,161,36,123,81,102,25,75,59,17,150,112,65,77,143], +[15,59,61,82,12,83,34,8,94,71,66,7,91,21,48,69,26,12,64,38,97,87,38,15,51,33,93,43,66,89], +[74,74,53,39,69,90,41,80,32,66,40,83,87,87,61,38,12,80,24,49,37,90,19,33,56,0,46,57,56,60], +[82,11,0,25,56,58,39,49,92,93,80,38,19,62,33,85,19,61,14,30,45,91,97,34,97,53,92,28,33,43], +[83,79,41,16,95,35,53,45,26,4,71,76,61,69,69,72,87,92,59,72,54,11,22,83,8,57,77,55,19,22], +[49,34,13,31,72,77,52,70,46,41,37,6,42,66,35,6,75,33,62,57,30,14,26,31,9,95,89,13,12,90], +[29,3,49,30,51,32,77,41,38,50,16,1,87,81,93,88,58,91,83,0,38,67,29,64,60,84,5,60,23,28], +[79,51,13,20,89,96,25,8,39,62,86,52,49,81,3,85,86,3,61,24,72,11,49,28,8,55,23,52,65,53], +[96,86,73,20,41,20,37,18,10,61,85,24,40,83,69,41,4,92,23,99,64,33,18,36,32,56,60,98,39,24], +[32,62,47,80,51,66,17,1,9,30,65,75,75,88,99,92,64,53,53,86,38,51,41,14,35,18,39,25,26,32], +[39,21,8,16,33,6,35,85,75,62,43,34,18,68,71,28,32,18,12,0,81,53,1,99,3,5,45,99,35,33], +[19,95,89,45,75,94,92,5,84,93,34,17,50,56,79,98,68,82,65,81,51,90,5,95,33,71,46,61,14,7], +[53,92,8,49,67,84,21,79,49,95,66,48,36,14,62,97,26,45,58,31,83,48,11,89,67,72,91,34,56,89], +[56,76,99,92,40,8,0,16,15,48,35,72,91,46,81,14,86,60,51,7,33,12,53,78,48,21,3,89,15,79], +[81,43,33,49,6,49,36,32,57,74,87,91,17,37,31,17,67,1,40,38,69,8,3,48,59,37,64,97,11,3], +[98,48,77,16,2,48,57,38,63,59,79,35,16,71,60,86,71,41,14,76,80,97,77,69,4,58,22,55,26,73], +[80,47,78,44,31,48,47,29,29,62,19,21,17,24,19,3,53,93,97,57,13,54,12,10,77,66,60,75,32,21], +[86,63,2,13,71,38,86,23,18,15,91,65,77,65,9,92,50,0,17,42,99,80,99,27,10,99,92,9,87,84], +[66,27,72,13,13,15,72,75,39,3,14,71,15,68,10,19,49,54,11,29,47,20,63,13,97,47,24,62,16,96], +[42,63,83,60,49,68,9,53,75,87,40,25,12,63,0,12,0,95,46,46,55,25,89,1,51,1,1,96,80,52], +[35,9,97,13,86,39,66,48,41,57,23,38,11,9,35,72,88,13,41,60,10,64,71,23,1,5,23,57,6,19], +[70,61,5,50,72,60,77,13,41,94,1,45,52,22,99,47,27,18,99,42,16,48,26,9,88,77,10,94,11,92], +[55,68,58,2,72,56,81,52,79,37,1,40,21,46,27,60,37,13,97,42,85,98,69,60,76,44,42,46,29,73], +[73,0,43,17,89,97,45,2,68,14,55,60,95,2,74,85,88,68,93,76,38,76,2,51,45,76,50,79,56,18], +[72,58,41,39,24,80,23,79,44,7,98,75,30,6,85,60,20,58,77,71,90,51,38,80,30,15,33,10,82,8]], + ZZ), + Matrix([ + [eye(29) * 2028539767964472550625641331179545072876560857886207583101, + Matrix([ 4260575808093245475167216057435155595594339172099000182569, + 169148395880755256182802335904188369274227936894862744452, + 4915975976683942569102447281579134986891620721539038348914, + 6113916866367364958834844982578214901958429746875633283248, + 5585689617819894460378537031623265659753379011388162534838, + 359776822829880747716695359574308645968094838905181892423, + -2800926112141776386671436511182421432449325232461665113305, + 941642292388230001722444876624818265766384442910688463158, + 3648811843256146649321864698600908938933015862008642023935, + -4104526163246702252932955226754097174212129127510547462419, + -704814955438106792441896903238080197619233342348191408078, + 1640882266829725529929398131287244562048075707575030019335, + -4068330845192910563212155694231438198040299927120544468520, + 136589038308366497790495711534532612862715724187671166593, + 2544937011460702462290799932536905731142196510605191645593, + 755591839174293940486133926192300657264122907519174116472, + -3683838489869297144348089243628436188645897133242795965021, + -522207137101161299969706310062775465103537953077871128403, + -2260451796032703984456606059649402832441331339246756656334, + -6476809325293587953616004856993300606040336446656916663680, + 3521944238996782387785653800944972787867472610035040989081, + 2270762115788407950241944504104975551914297395787473242379, + -3259947194628712441902262570532921252128444706733549251156, + -5624569821491886970999097239695637132075823246850431083557, + -3262698255682055804320585332902837076064075936601504555698, + 5786719943788937667411185880136324396357603606944869545501, + -955257841973865996077323863289453200904051299086000660036, + -1294235552446355326174641248209752679127075717918392702116, + -3718353510747301598130831152458342785269166356215331448279, + ]),], + [zeros(1, 29), zeros(1, 1)], + ]).to_DM().to_dense(), + ZZ(2028539767964472550625641331179545072876560857886207583101), + ), + + + ( + 'qq_1', + DM([[(1,2), 0], [0, 2]], QQ), + DM([[1, 0], [0, 1]], QQ), + QQ(1), + ), + + ( + # Standard square case + 'qq_2', + DM([[0, 1], + [1, 1]], QQ), + DM([[1, 0], + [0, 1]], QQ), + QQ(1), + ), + + ( + # m < n case + 'qq_3', + DM([[1, 2, 1], + [3, 4, 1]], QQ), + DM([[1, 0, -1], + [0, 1, 1]], QQ), + QQ(1), + ), + + ( + # same m < n but reversed + 'qq_4', + DM([[3, 4, 1], + [1, 2, 1]], QQ), + DM([[1, 0, -1], + [0, 1, 1]], QQ), + QQ(1), + ), + + ( + # m > n case + 'qq_5', + DM([[1, 0], + [1, 3], + [0, 1]], QQ), + DM([[1, 0], + [0, 1], + [0, 0]], QQ), + QQ(1), + ), + + ( + # Example with missing pivot + 'qq_6', + DM([[1, 0, 1], + [3, 0, 1]], QQ), + DM([[1, 0, 0], + [0, 0, 1]], QQ), + QQ(1), + ), + + ( + # This is intended to trigger the threshold where we give up on + # clearing denominators. + 'qq_large_1', + qq_large_1, + DomainMatrix.eye(11, QQ).to_dense(), + QQ(1), + ), + + ( + # This is intended to trigger the threshold where we use rref_den over + # QQ. + 'qq_large_2', + qq_large_2, + DomainMatrix.eye(11, QQ).to_dense(), + QQ(1), + ), + + ( + # Example with missing pivot and no replacement + + # This example is just enough to show a different result from the dense + # and sparse versions of the algorithm: + # + # >>> A = Matrix([[0, 1], [0, 2], [1, 0]]) + # >>> A.to_DM().to_sparse().rref_den()[0].to_Matrix() + # Matrix([ + # [1, 0], + # [0, 1], + # [0, 0]]) + # >>> A.to_DM().to_dense().rref_den()[0].to_Matrix() + # Matrix([ + # [2, 0], + # [0, 2], + # [0, 0]]) + # + 'qq_7', + DM([[0, 1], + [0, 2], + [1, 0]], QQ), + DM([[1, 0], + [0, 1], + [0, 0]], QQ), + QQ(1), + ), + + ( + # Gaussian integers + 'zz_i_1', + DM([[(0,1), 1, 1], + [ 1, 1, 1]], ZZ_I), + DM([[1, 0, 0], + [0, 1, 1]], ZZ_I), + ZZ_I(1), + ), + + ( + # EX: test_issue_23718 + 'EX_1', + DM([ + [a, b, 1], + [c, d, 1]], EX), + DM([[a*d - b*c, 0, -b + d], + [ 0, a*d - b*c, a - c]], EX), + EX(a*d - b*c), + ), + +] + + +def _to_DM(A, ans): + """Convert the answer to DomainMatrix.""" + if isinstance(A, DomainMatrix): + return A.to_dense() + elif isinstance(A, Matrix): + return A.to_DM(ans.domain).to_dense() + + if not (hasattr(A, 'shape') and hasattr(A, 'domain')): + shape, domain = ans.shape, ans.domain + else: + shape, domain = A.shape, A.domain + + if isinstance(A, (DDM, list)): + return DomainMatrix(list(A), shape, domain).to_dense() + elif isinstance(A, (SDM, dict)): + return DomainMatrix(dict(A), shape, domain).to_dense() + else: + assert False # pragma: no cover + + +def _pivots(A_rref): + """Return the pivots from the rref of A.""" + return tuple(sorted(map(min, A_rref.to_sdm().values()))) + + +def _check_cancel(result, rref_ans, den_ans): + """Check the cancelled result.""" + rref, den, pivots = result + if isinstance(rref, (DDM, SDM, list, dict)): + assert type(pivots) is list + pivots = tuple(pivots) + rref = _to_DM(rref, rref_ans) + rref2, den2 = rref.cancel_denom(den) + assert rref2 == rref_ans + assert den2 == den_ans + assert pivots == _pivots(rref) + + +def _check_divide(result, rref_ans, den_ans): + """Check the divided result.""" + rref, pivots = result + if isinstance(rref, (DDM, SDM, list, dict)): + assert type(pivots) is list + pivots = tuple(pivots) + rref_ans = rref_ans.to_field() / den_ans + rref = _to_DM(rref, rref_ans) + assert rref == rref_ans + assert _pivots(rref) == pivots + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_Matrix_rref(name, A, A_rref, den): + K = A.domain + A = A.to_Matrix() + A_rref_found, pivots = A.rref() + if K.is_EX: + A_rref_found = A_rref_found.expand() + _check_divide((A_rref_found, pivots), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_dense_rref(name, A, A_rref, den): + A = A.to_field() + _check_divide(A.rref(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_dense_rref_den(name, A, A_rref, den): + _check_cancel(A.rref_den(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_sparse_rref(name, A, A_rref, den): + A = A.to_field().to_sparse() + _check_divide(A.rref(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_sparse_rref_den(name, A, A_rref, den): + A = A.to_sparse() + _check_cancel(A.rref_den(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_sparse_rref_den_keep_domain(name, A, A_rref, den): + A = A.to_sparse() + A_rref_f, den_f, pivots_f = A.rref_den(keep_domain=False) + A_rref_f = A_rref_f.to_field() / den_f + _check_divide((A_rref_f, pivots_f), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_sparse_rref_den_keep_domain_CD(name, A, A_rref, den): + A = A.to_sparse() + A_rref_f, den_f, pivots_f = A.rref_den(keep_domain=False, method='CD') + A_rref_f = A_rref_f.to_field() / den_f + _check_divide((A_rref_f, pivots_f), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_dm_sparse_rref_den_keep_domain_GJ(name, A, A_rref, den): + A = A.to_sparse() + A_rref_f, den_f, pivots_f = A.rref_den(keep_domain=False, method='GJ') + A_rref_f = A_rref_f.to_field() / den_f + _check_divide((A_rref_f, pivots_f), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_ddm_rref_den(name, A, A_rref, den): + A = A.to_ddm() + _check_cancel(A.rref_den(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_sdm_rref_den(name, A, A_rref, den): + A = A.to_sdm() + _check_cancel(A.rref_den(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_ddm_rref(name, A, A_rref, den): + A = A.to_field().to_ddm() + _check_divide(A.rref(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_sdm_rref(name, A, A_rref, den): + A = A.to_field().to_sdm() + _check_divide(A.rref(), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_ddm_irref(name, A, A_rref, den): + A = A.to_field().to_ddm().copy() + pivots_found = ddm_irref(A) + _check_divide((A, pivots_found), A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_ddm_irref_den(name, A, A_rref, den): + A = A.to_ddm().copy() + (den_found, pivots_found) = ddm_irref_den(A, A.domain) + result = (A, den_found, pivots_found) + _check_cancel(result, A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_sparse_sdm_rref(name, A, A_rref, den): + A = A.to_field().to_sdm() + _check_divide(sdm_irref(A)[:2], A_rref, den) + + +@pytest.mark.parametrize('name, A, A_rref, den', RREF_EXAMPLES) +def test_sparse_sdm_rref_den(name, A, A_rref, den): + A = A.to_sdm().copy() + K = A.domain + _check_cancel(sdm_rref_den(A, K), A_rref, den) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_sdm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_sdm.py new file mode 100644 index 0000000000000000000000000000000000000000..cd7e5d460a1b2d44279a2a1772cc901f80ca733e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_sdm.py @@ -0,0 +1,428 @@ +""" +Tests for the basic functionality of the SDM class. +""" + +from itertools import product + +from sympy.core.singleton import S +from sympy.external.gmpy import GROUND_TYPES +from sympy.testing.pytest import raises + +from sympy.polys.domains import QQ, ZZ, EXRAW +from sympy.polys.matrices.sdm import SDM +from sympy.polys.matrices.ddm import DDM +from sympy.polys.matrices.exceptions import (DMBadInputError, DMDomainError, + DMShapeError) + + +def test_SDM(): + A = SDM({0:{0:ZZ(1)}}, (2, 2), ZZ) + assert A.domain == ZZ + assert A.shape == (2, 2) + assert dict(A) == {0:{0:ZZ(1)}} + + raises(DMBadInputError, lambda: SDM({5:{1:ZZ(0)}}, (2, 2), ZZ)) + raises(DMBadInputError, lambda: SDM({0:{5:ZZ(0)}}, (2, 2), ZZ)) + + +def test_DDM_str(): + sdm = SDM({0:{0:ZZ(1)}, 1:{1:ZZ(1)}}, (2, 2), ZZ) + assert str(sdm) == '{0: {0: 1}, 1: {1: 1}}' + if GROUND_TYPES == 'gmpy': # pragma: no cover + assert repr(sdm) == 'SDM({0: {0: mpz(1)}, 1: {1: mpz(1)}}, (2, 2), ZZ)' + else: # pragma: no cover + assert repr(sdm) == 'SDM({0: {0: 1}, 1: {1: 1}}, (2, 2), ZZ)' + + +def test_SDM_new(): + A = SDM({0:{0:ZZ(1)}}, (2, 2), ZZ) + B = A.new({}, (2, 2), ZZ) + assert B == SDM({}, (2, 2), ZZ) + + +def test_SDM_copy(): + A = SDM({0:{0:ZZ(1)}}, (2, 2), ZZ) + B = A.copy() + assert A == B + A[0][0] = ZZ(2) + assert A != B + + +def test_SDM_from_list(): + A = SDM.from_list([[ZZ(0), ZZ(1)], [ZZ(1), ZZ(0)]], (2, 2), ZZ) + assert A == SDM({0:{1:ZZ(1)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + + raises(DMBadInputError, lambda: SDM.from_list([[ZZ(0)], [ZZ(0), ZZ(1)]], (2, 2), ZZ)) + raises(DMBadInputError, lambda: SDM.from_list([[ZZ(0), ZZ(1)]], (2, 2), ZZ)) + + +def test_SDM_to_list(): + A = SDM({0:{1: ZZ(1)}}, (2, 2), ZZ) + assert A.to_list() == [[ZZ(0), ZZ(1)], [ZZ(0), ZZ(0)]] + + A = SDM({}, (0, 2), ZZ) + assert A.to_list() == [] + + A = SDM({}, (2, 0), ZZ) + assert A.to_list() == [[], []] + + +def test_SDM_to_list_flat(): + A = SDM({0:{1: ZZ(1)}}, (2, 2), ZZ) + assert A.to_list_flat() == [ZZ(0), ZZ(1), ZZ(0), ZZ(0)] + + +def test_SDM_to_dok(): + A = SDM({0:{1: ZZ(1)}}, (2, 2), ZZ) + assert A.to_dok() == {(0, 1): ZZ(1)} + + +def test_SDM_from_ddm(): + A = DDM([[ZZ(1), ZZ(0)], [ZZ(1), ZZ(0)]], (2, 2), ZZ) + B = SDM.from_ddm(A) + assert B.domain == ZZ + assert B.shape == (2, 2) + assert dict(B) == {0:{0:ZZ(1)}, 1:{0:ZZ(1)}} + + +def test_SDM_to_ddm(): + A = SDM({0:{1: ZZ(1)}}, (2, 2), ZZ) + B = DDM([[ZZ(0), ZZ(1)], [ZZ(0), ZZ(0)]], (2, 2), ZZ) + assert A.to_ddm() == B + + +def test_SDM_to_sdm(): + A = SDM({0:{1: ZZ(1)}}, (2, 2), ZZ) + assert A.to_sdm() == A + + +def test_SDM_getitem(): + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + assert A.getitem(0, 0) == ZZ.zero + assert A.getitem(0, 1) == ZZ.one + assert A.getitem(1, 0) == ZZ.zero + assert A.getitem(-2, -2) == ZZ.zero + assert A.getitem(-2, -1) == ZZ.one + assert A.getitem(-1, -2) == ZZ.zero + raises(IndexError, lambda: A.getitem(2, 0)) + raises(IndexError, lambda: A.getitem(0, 2)) + + +def test_SDM_setitem(): + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + A.setitem(0, 0, ZZ(1)) + assert A == SDM({0:{0:ZZ(1), 1:ZZ(1)}}, (2, 2), ZZ) + A.setitem(1, 0, ZZ(1)) + assert A == SDM({0:{0:ZZ(1), 1:ZZ(1)}, 1:{0:ZZ(1)}}, (2, 2), ZZ) + A.setitem(1, 0, ZZ(0)) + assert A == SDM({0:{0:ZZ(1), 1:ZZ(1)}}, (2, 2), ZZ) + # Repeat the above test so that this time the row is empty + A.setitem(1, 0, ZZ(0)) + assert A == SDM({0:{0:ZZ(1), 1:ZZ(1)}}, (2, 2), ZZ) + A.setitem(0, 0, ZZ(0)) + assert A == SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + # This time the row is there but column is empty + A.setitem(0, 0, ZZ(0)) + assert A == SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + raises(IndexError, lambda: A.setitem(2, 0, ZZ(1))) + raises(IndexError, lambda: A.setitem(0, 2, ZZ(1))) + + +def test_SDM_extract_slice(): + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + B = A.extract_slice(slice(1, 2), slice(1, 2)) + assert B == SDM({0:{0:ZZ(4)}}, (1, 1), ZZ) + + +def test_SDM_extract(): + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + B = A.extract([1], [1]) + assert B == SDM({0:{0:ZZ(4)}}, (1, 1), ZZ) + B = A.extract([1, 0], [1, 0]) + assert B == SDM({0:{0:ZZ(4), 1:ZZ(3)}, 1:{0:ZZ(2), 1:ZZ(1)}}, (2, 2), ZZ) + B = A.extract([1, 1], [1, 1]) + assert B == SDM({0:{0:ZZ(4), 1:ZZ(4)}, 1:{0:ZZ(4), 1:ZZ(4)}}, (2, 2), ZZ) + B = A.extract([-1], [-1]) + assert B == SDM({0:{0:ZZ(4)}}, (1, 1), ZZ) + + A = SDM({}, (2, 2), ZZ) + B = A.extract([0, 1, 0], [0, 0]) + assert B == SDM({}, (3, 2), ZZ) + + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + assert A.extract([], []) == SDM.zeros((0, 0), ZZ) + assert A.extract([1], []) == SDM.zeros((1, 0), ZZ) + assert A.extract([], [1]) == SDM.zeros((0, 1), ZZ) + + raises(IndexError, lambda: A.extract([2], [0])) + raises(IndexError, lambda: A.extract([0], [2])) + raises(IndexError, lambda: A.extract([-3], [0])) + raises(IndexError, lambda: A.extract([0], [-3])) + + +def test_SDM_zeros(): + A = SDM.zeros((2, 2), ZZ) + assert A.domain == ZZ + assert A.shape == (2, 2) + assert dict(A) == {} + +def test_SDM_ones(): + A = SDM.ones((1, 2), QQ) + assert A.domain == QQ + assert A.shape == (1, 2) + assert dict(A) == {0:{0:QQ(1), 1:QQ(1)}} + +def test_SDM_eye(): + A = SDM.eye((2, 2), ZZ) + assert A.domain == ZZ + assert A.shape == (2, 2) + assert dict(A) == {0:{0:ZZ(1)}, 1:{1:ZZ(1)}} + + +def test_SDM_diag(): + A = SDM.diag([ZZ(1), ZZ(2)], ZZ, (2, 3)) + assert A == SDM({0:{0:ZZ(1)}, 1:{1:ZZ(2)}}, (2, 3), ZZ) + + +def test_SDM_transpose(): + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(1), 1:ZZ(3)}, 1:{0:ZZ(2), 1:ZZ(4)}}, (2, 2), ZZ) + assert A.transpose() == B + + A = SDM({0:{1:ZZ(2)}}, (2, 2), ZZ) + B = SDM({1:{0:ZZ(2)}}, (2, 2), ZZ) + assert A.transpose() == B + + A = SDM({0:{1:ZZ(2)}}, (1, 2), ZZ) + B = SDM({1:{0:ZZ(2)}}, (2, 1), ZZ) + assert A.transpose() == B + + +def test_SDM_mul(): + A = SDM({0:{0:ZZ(2)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(4)}}, (2, 2), ZZ) + assert A*ZZ(2) == B + assert ZZ(2)*A == B + + raises(TypeError, lambda: A*QQ(1, 2)) + raises(TypeError, lambda: QQ(1, 2)*A) + + +def test_SDM_mul_elementwise(): + A = SDM({0:{0:ZZ(2), 1:ZZ(2)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(4)}, 1:{0:ZZ(3)}}, (2, 2), ZZ) + C = SDM({0:{0:ZZ(8)}}, (2, 2), ZZ) + assert A.mul_elementwise(B) == C + assert B.mul_elementwise(A) == C + + Aq = A.convert_to(QQ) + A1 = SDM({0:{0:ZZ(1)}}, (1, 1), ZZ) + + raises(DMDomainError, lambda: Aq.mul_elementwise(B)) + raises(DMShapeError, lambda: A1.mul_elementwise(B)) + + +def test_SDM_matmul(): + A = SDM({0:{0:ZZ(2)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(4)}}, (2, 2), ZZ) + assert A.matmul(A) == A*A == B + + C = SDM({0:{0:ZZ(2)}}, (2, 2), QQ) + raises(DMDomainError, lambda: A.matmul(C)) + + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(7), 1:ZZ(10)}, 1:{0:ZZ(15), 1:ZZ(22)}}, (2, 2), ZZ) + assert A.matmul(A) == A*A == B + + A22 = SDM({0:{0:ZZ(4)}}, (2, 2), ZZ) + A32 = SDM({0:{0:ZZ(2)}}, (3, 2), ZZ) + A23 = SDM({0:{0:ZZ(4)}}, (2, 3), ZZ) + A33 = SDM({0:{0:ZZ(8)}}, (3, 3), ZZ) + A22 = SDM({0:{0:ZZ(8)}}, (2, 2), ZZ) + assert A32.matmul(A23) == A33 + assert A23.matmul(A32) == A22 + # XXX: @ not supported by SDM... + #assert A32.matmul(A23) == A32 @ A23 == A33 + #assert A23.matmul(A32) == A23 @ A32 == A22 + #raises(DMShapeError, lambda: A23 @ A22) + raises(DMShapeError, lambda: A23.matmul(A22)) + + A = SDM({0: {0: ZZ(-1), 1: ZZ(1)}}, (1, 2), ZZ) + B = SDM({0: {0: ZZ(-1)}, 1: {0: ZZ(-1)}}, (2, 1), ZZ) + assert A.matmul(B) == A*B == SDM({}, (1, 1), ZZ) + + +def test_matmul_exraw(): + + def dm(d): + result = {} + for i, row in d.items(): + row = {j:val for j, val in row.items() if val} + if row: + result[i] = row + return SDM(result, (2, 2), EXRAW) + + values = [S.NegativeInfinity, S.NegativeOne, S.Zero, S.One, S.Infinity] + for a, b, c, d in product(*[values]*4): + Ad = dm({0: {0:a, 1:b}, 1: {0:c, 1:d}}) + Ad2 = dm({0: {0:a*a + b*c, 1:a*b + b*d}, 1:{0:c*a + d*c, 1: c*b + d*d}}) + assert Ad * Ad == Ad2 + + +def test_SDM_add(): + A = SDM({0:{1:ZZ(1)}, 1:{0:ZZ(2), 1:ZZ(3)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(1)}, 1:{0:ZZ(-2), 1:ZZ(3)}}, (2, 2), ZZ) + C = SDM({0:{0:ZZ(1), 1:ZZ(1)}, 1:{1:ZZ(6)}}, (2, 2), ZZ) + assert A.add(B) == B.add(A) == A + B == B + A == C + + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(1)}, 1:{0:ZZ(-2), 1:ZZ(3)}}, (2, 2), ZZ) + C = SDM({0:{0:ZZ(1), 1:ZZ(1)}, 1:{0:ZZ(-2), 1:ZZ(3)}}, (2, 2), ZZ) + assert A.add(B) == B.add(A) == A + B == B + A == C + + raises(TypeError, lambda: A + []) + + +def test_SDM_sub(): + A = SDM({0:{1:ZZ(1)}, 1:{0:ZZ(2), 1:ZZ(3)}}, (2, 2), ZZ) + B = SDM({0:{0:ZZ(1)}, 1:{0:ZZ(-2), 1:ZZ(3)}}, (2, 2), ZZ) + C = SDM({0:{0:ZZ(-1), 1:ZZ(1)}, 1:{0:ZZ(4)}}, (2, 2), ZZ) + assert A.sub(B) == A - B == C + + raises(TypeError, lambda: A - []) + + +def test_SDM_neg(): + A = SDM({0:{1:ZZ(1)}, 1:{0:ZZ(2), 1:ZZ(3)}}, (2, 2), ZZ) + B = SDM({0:{1:ZZ(-1)}, 1:{0:ZZ(-2), 1:ZZ(-3)}}, (2, 2), ZZ) + assert A.neg() == -A == B + + +def test_SDM_convert_to(): + A = SDM({0:{1:ZZ(1)}, 1:{0:ZZ(2), 1:ZZ(3)}}, (2, 2), ZZ) + B = SDM({0:{1:QQ(1)}, 1:{0:QQ(2), 1:QQ(3)}}, (2, 2), QQ) + C = A.convert_to(QQ) + assert C == B + assert C.domain == QQ + + D = A.convert_to(ZZ) + assert D == A + assert D.domain == ZZ + + +def test_SDM_hstack(): + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + B = SDM({1:{1:ZZ(1)}}, (2, 2), ZZ) + AA = SDM({0:{1:ZZ(1), 3:ZZ(1)}}, (2, 4), ZZ) + AB = SDM({0:{1:ZZ(1)}, 1:{3:ZZ(1)}}, (2, 4), ZZ) + assert SDM.hstack(A) == A + assert SDM.hstack(A, A) == AA + assert SDM.hstack(A, B) == AB + + +def test_SDM_vstack(): + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + B = SDM({1:{1:ZZ(1)}}, (2, 2), ZZ) + AA = SDM({0:{1:ZZ(1)}, 2:{1:ZZ(1)}}, (4, 2), ZZ) + AB = SDM({0:{1:ZZ(1)}, 3:{1:ZZ(1)}}, (4, 2), ZZ) + assert SDM.vstack(A) == A + assert SDM.vstack(A, A) == AA + assert SDM.vstack(A, B) == AB + + +def test_SDM_applyfunc(): + A = SDM({0:{1:ZZ(1)}}, (2, 2), ZZ) + B = SDM({0:{1:ZZ(2)}}, (2, 2), ZZ) + assert A.applyfunc(lambda x: 2*x, ZZ) == B + + +def test_SDM_inv(): + A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + B = SDM({0:{0:QQ(-2), 1:QQ(1)}, 1:{0:QQ(3, 2), 1:QQ(-1, 2)}}, (2, 2), QQ) + assert A.inv() == B + + +def test_SDM_det(): + A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + assert A.det() == QQ(-2) + + +def test_SDM_lu(): + A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + L = SDM({0:{0:QQ(1)}, 1:{0:QQ(3), 1:QQ(1)}}, (2, 2), QQ) + #U = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(-2)}}, (2, 2), QQ) + #swaps = [] + # This doesn't quite work. U has some nonzero elements in the lower part. + #assert A.lu() == (L, U, swaps) + assert A.lu()[0] == L + + +def test_SDM_lu_solve(): + A = SDM({0:{0:QQ(1), 1:QQ(2)}, 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + b = SDM({0:{0:QQ(1)}, 1:{0:QQ(2)}}, (2, 1), QQ) + x = SDM({1:{0:QQ(1, 2)}}, (2, 1), QQ) + assert A.matmul(x) == b + assert A.lu_solve(b) == x + + +def test_SDM_charpoly(): + A = SDM({0:{0:ZZ(1), 1:ZZ(2)}, 1:{0:ZZ(3), 1:ZZ(4)}}, (2, 2), ZZ) + assert A.charpoly() == [ZZ(1), ZZ(-5), ZZ(-2)] + + +def test_SDM_nullspace(): + # More tests are in test_nullspace.py + A = SDM({0:{0:QQ(1), 1:QQ(1)}}, (2, 2), QQ) + assert A.nullspace()[0] == SDM({0:{0:QQ(-1), 1:QQ(1)}}, (1, 2), QQ) + + +def test_SDM_rref(): + # More tests are in test_rref.py + + A = SDM({0:{0:QQ(1), 1:QQ(2)}, + 1:{0:QQ(3), 1:QQ(4)}}, (2, 2), QQ) + A_rref = SDM({0:{0:QQ(1)}, 1:{1:QQ(1)}}, (2, 2), QQ) + assert A.rref() == (A_rref, [0, 1]) + + A = SDM({0: {0: QQ(1), 1: QQ(2), 2: QQ(2)}, + 1: {0: QQ(3), 2: QQ(4)}}, (2, 3), ZZ) + A_rref = SDM({0: {0: QQ(1,1), 2: QQ(4,3)}, + 1: {1: QQ(1,1), 2: QQ(1,3)}}, (2, 3), QQ) + assert A.rref() == (A_rref, [0, 1]) + + +def test_SDM_particular(): + A = SDM({0:{0:QQ(1)}}, (2, 2), QQ) + Apart = SDM.zeros((1, 2), QQ) + assert A.particular() == Apart + + +def test_SDM_is_zero_matrix(): + A = SDM({0: {0: QQ(1)}}, (2, 2), QQ) + Azero = SDM.zeros((1, 2), QQ) + assert A.is_zero_matrix() is False + assert Azero.is_zero_matrix() is True + + +def test_SDM_is_upper(): + A = SDM({0: {0: QQ(1), 1: QQ(2), 2: QQ(3), 3: QQ(4)}, + 1: {1: QQ(5), 2: QQ(6), 3: QQ(7)}, + 2: {2: QQ(8), 3: QQ(9)}}, (3, 4), QQ) + B = SDM({0: {0: QQ(1), 1: QQ(2), 2: QQ(3), 3: QQ(4)}, + 1: {1: QQ(5), 2: QQ(6), 3: QQ(7)}, + 2: {1: QQ(7), 2: QQ(8), 3: QQ(9)}}, (3, 4), QQ) + assert A.is_upper() is True + assert B.is_upper() is False + + +def test_SDM_is_lower(): + A = SDM({0: {0: QQ(1), 1: QQ(2), 2: QQ(3), 3: QQ(4)}, + 1: {1: QQ(5), 2: QQ(6), 3: QQ(7)}, + 2: {2: QQ(8), 3: QQ(9)}}, (3, 4), QQ + ).transpose() + B = SDM({0: {0: QQ(1), 1: QQ(2), 2: QQ(3), 3: QQ(4)}, + 1: {1: QQ(5), 2: QQ(6), 3: QQ(7)}, + 2: {1: QQ(7), 2: QQ(8), 3: QQ(9)}}, (3, 4), QQ + ).transpose() + assert A.is_lower() is True + assert B.is_lower() is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_xxm.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_xxm.py new file mode 100644 index 0000000000000000000000000000000000000000..628d66d15f5db82718231ba8f89bc0dadd393594 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/matrices/tests/test_xxm.py @@ -0,0 +1,1023 @@ +# +# Test basic features of DDM, SDM and DFM. +# +# These three types are supposed to be interchangeable, so we should use the +# same tests for all of them for the most part. +# +# The tests here cover the basic part of the interface that the three types +# should expose and that DomainMatrix should mostly rely on. +# +# More in-depth tests of the heavier algorithms like rref etc should go in +# their own test files. +# +# Any new methods added to the DDM, SDM or DFM classes should be tested here +# and added to all classes. +# + +from sympy.external.gmpy import GROUND_TYPES + +from sympy import ZZ, QQ, GF, ZZ_I, symbols + +from sympy.polys.matrices.exceptions import ( + DMBadInputError, + DMDomainError, + DMNonSquareMatrixError, + DMNonInvertibleMatrixError, + DMShapeError, +) + +from sympy.polys.matrices.domainmatrix import DM, DomainMatrix, DDM, SDM, DFM + +from sympy.testing.pytest import raises, skip +import pytest + + +def test_XXM_constructors(): + """Test the DDM, etc constructors.""" + + lol = [ + [ZZ(1), ZZ(2)], + [ZZ(3), ZZ(4)], + [ZZ(5), ZZ(6)], + ] + dod = { + 0: {0: ZZ(1), 1: ZZ(2)}, + 1: {0: ZZ(3), 1: ZZ(4)}, + 2: {0: ZZ(5), 1: ZZ(6)}, + } + + lol_0x0 = [] + lol_0x2 = [] + lol_2x0 = [[], []] + dod_0x0 = {} + dod_0x2 = {} + dod_2x0 = {} + + lol_bad = [ + [ZZ(1), ZZ(2)], + [ZZ(3), ZZ(4)], + [ZZ(5), ZZ(6), ZZ(7)], + ] + dod_bad = { + 0: {0: ZZ(1), 1: ZZ(2)}, + 1: {0: ZZ(3), 1: ZZ(4)}, + 2: {0: ZZ(5), 1: ZZ(6), 2: ZZ(7)}, + } + + XDM_dense = [DDM] + XDM_sparse = [SDM] + + if GROUND_TYPES == 'flint': + XDM_dense.append(DFM) + + for XDM in XDM_dense: + + A = XDM(lol, (3, 2), ZZ) + assert A.rows == 3 + assert A.cols == 2 + assert A.domain == ZZ + assert A.shape == (3, 2) + if XDM is not DFM: + assert ZZ.of_type(A[0][0]) is True + else: + assert ZZ.of_type(A.rep[0, 0]) is True + + Adm = DomainMatrix(lol, (3, 2), ZZ) + if XDM is DFM: + assert Adm.rep == A + assert Adm.rep.to_ddm() != A + elif GROUND_TYPES == 'flint': + assert Adm.rep.to_ddm() == A + assert Adm.rep != A + else: + assert Adm.rep == A + assert Adm.rep.to_ddm() == A + + assert XDM(lol_0x0, (0, 0), ZZ).shape == (0, 0) + assert XDM(lol_0x2, (0, 2), ZZ).shape == (0, 2) + assert XDM(lol_2x0, (2, 0), ZZ).shape == (2, 0) + raises(DMBadInputError, lambda: XDM(lol, (2, 3), ZZ)) + raises(DMBadInputError, lambda: XDM(lol_bad, (3, 2), ZZ)) + raises(DMBadInputError, lambda: XDM(dod, (3, 2), ZZ)) + + for XDM in XDM_sparse: + + A = XDM(dod, (3, 2), ZZ) + assert A.rows == 3 + assert A.cols == 2 + assert A.domain == ZZ + assert A.shape == (3, 2) + assert ZZ.of_type(A[0][0]) is True + + assert DomainMatrix(dod, (3, 2), ZZ).rep == A + + assert XDM(dod_0x0, (0, 0), ZZ).shape == (0, 0) + assert XDM(dod_0x2, (0, 2), ZZ).shape == (0, 2) + assert XDM(dod_2x0, (2, 0), ZZ).shape == (2, 0) + raises(DMBadInputError, lambda: XDM(dod, (2, 3), ZZ)) + raises(DMBadInputError, lambda: XDM(lol, (3, 2), ZZ)) + raises(DMBadInputError, lambda: XDM(dod_bad, (3, 2), ZZ)) + + raises(DMBadInputError, lambda: DomainMatrix(lol, (2, 3), ZZ)) + raises(DMBadInputError, lambda: DomainMatrix(lol_bad, (3, 2), ZZ)) + raises(DMBadInputError, lambda: DomainMatrix(dod_bad, (3, 2), ZZ)) + + +def test_XXM_eq(): + """Test equality for DDM, SDM, DFM and DomainMatrix.""" + + lol1 = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + dod1 = {0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}} + + lol2 = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(5)]] + dod2 = {0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(5)}} + + A1_ddm = DDM(lol1, (2, 2), ZZ) + A1_sdm = SDM(dod1, (2, 2), ZZ) + A1_dm_d = DomainMatrix(lol1, (2, 2), ZZ) + A1_dm_s = DomainMatrix(dod1, (2, 2), ZZ) + + A2_ddm = DDM(lol2, (2, 2), ZZ) + A2_sdm = SDM(dod2, (2, 2), ZZ) + A2_dm_d = DomainMatrix(lol2, (2, 2), ZZ) + A2_dm_s = DomainMatrix(dod2, (2, 2), ZZ) + + A1_all = [A1_ddm, A1_sdm, A1_dm_d, A1_dm_s] + A2_all = [A2_ddm, A2_sdm, A2_dm_d, A2_dm_s] + + if GROUND_TYPES == 'flint': + + A1_dfm = DFM([[1, 2], [3, 4]], (2, 2), ZZ) + A2_dfm = DFM([[1, 2], [3, 5]], (2, 2), ZZ) + + A1_all.append(A1_dfm) + A2_all.append(A2_dfm) + + for n, An in enumerate(A1_all): + for m, Am in enumerate(A1_all): + if n == m: + assert (An == Am) is True + assert (An != Am) is False + else: + assert (An == Am) is False + assert (An != Am) is True + + for n, An in enumerate(A2_all): + for m, Am in enumerate(A2_all): + if n == m: + assert (An == Am) is True + assert (An != Am) is False + else: + assert (An == Am) is False + assert (An != Am) is True + + for n, A1 in enumerate(A1_all): + for m, A2 in enumerate(A2_all): + assert (A1 == A2) is False + assert (A1 != A2) is True + + +def test_to_XXM(): + """Test to_ddm etc. for DDM, SDM, DFM and DomainMatrix.""" + + lol = [[ZZ(1), ZZ(2)], [ZZ(3), ZZ(4)]] + dod = {0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3), 1: ZZ(4)}} + + A_ddm = DDM(lol, (2, 2), ZZ) + A_sdm = SDM(dod, (2, 2), ZZ) + A_dm_d = DomainMatrix(lol, (2, 2), ZZ) + A_dm_s = DomainMatrix(dod, (2, 2), ZZ) + + A_all = [A_ddm, A_sdm, A_dm_d, A_dm_s] + + if GROUND_TYPES == 'flint': + A_dfm = DFM(lol, (2, 2), ZZ) + A_all.append(A_dfm) + + for A in A_all: + assert A.to_ddm() == A_ddm + assert A.to_sdm() == A_sdm + if GROUND_TYPES != 'flint': + raises(NotImplementedError, lambda: A.to_dfm()) + assert A.to_dfm_or_ddm() == A_ddm + + # Add e.g. DDM.to_DM()? + # assert A.to_DM() == A_dm + + if GROUND_TYPES == 'flint': + for A in A_all: + assert A.to_dfm() == A_dfm + for K in [ZZ, QQ, GF(5), ZZ_I]: + if isinstance(A, DFM) and not DFM._supports_domain(K): + raises(NotImplementedError, lambda: A.convert_to(K)) + else: + A_K = A.convert_to(K) + if DFM._supports_domain(K): + A_dfm_K = A_dfm.convert_to(K) + assert A_K.to_dfm() == A_dfm_K + assert A_K.to_dfm_or_ddm() == A_dfm_K + else: + raises(NotImplementedError, lambda: A_K.to_dfm()) + assert A_K.to_dfm_or_ddm() == A_ddm.convert_to(K) + + +def test_DFM_domains(): + """Test which domains are supported by DFM.""" + + x, y = symbols('x, y') + + if GROUND_TYPES in ('python', 'gmpy'): + + supported = [] + flint_funcs = {} + not_supported = [ZZ, QQ, GF(5), QQ[x], QQ[x,y]] + + elif GROUND_TYPES == 'flint': + + import flint + supported = [ZZ, QQ] + flint_funcs = { + ZZ: flint.fmpz_mat, + QQ: flint.fmpq_mat, + GF(5): None, + } + not_supported = [ + # Other domains could be supported but not implemented as matrices + # in python-flint: + QQ[x], + QQ[x,y], + QQ.frac_field(x,y), + # Others would potentially never be supported by python-flint: + ZZ_I, + ] + + else: + assert False, "Unknown GROUND_TYPES: %s" % GROUND_TYPES + + for domain in supported: + assert DFM._supports_domain(domain) is True + if flint_funcs[domain] is not None: + assert DFM._get_flint_func(domain) == flint_funcs[domain] + for domain in not_supported: + assert DFM._supports_domain(domain) is False + raises(NotImplementedError, lambda: DFM._get_flint_func(domain)) + + +def _DM(lol, typ, K): + """Make a DM of type typ over K from lol.""" + A = DM(lol, K) + + if typ == 'DDM': + return A.to_ddm() + elif typ == 'SDM': + return A.to_sdm() + elif typ == 'DFM': + if GROUND_TYPES != 'flint': + skip("DFM not supported in this ground type") + return A.to_dfm() + else: + assert False, "Unknown type %s" % typ + + +def _DMZ(lol, typ): + """Make a DM of type typ over ZZ from lol.""" + return _DM(lol, typ, ZZ) + + +def _DMQ(lol, typ): + """Make a DM of type typ over QQ from lol.""" + return _DM(lol, typ, QQ) + + +def DM_ddm(lol, K): + """Make a DDM over K from lol.""" + return _DM(lol, 'DDM', K) + + +def DM_sdm(lol, K): + """Make a SDM over K from lol.""" + return _DM(lol, 'SDM', K) + + +def DM_dfm(lol, K): + """Make a DFM over K from lol.""" + return _DM(lol, 'DFM', K) + + +def DMZ_ddm(lol): + """Make a DDM from lol.""" + return _DMZ(lol, 'DDM') + + +def DMZ_sdm(lol): + """Make a SDM from lol.""" + return _DMZ(lol, 'SDM') + + +def DMZ_dfm(lol): + """Make a DFM from lol.""" + return _DMZ(lol, 'DFM') + + +def DMQ_ddm(lol): + """Make a DDM from lol.""" + return _DMQ(lol, 'DDM') + + +def DMQ_sdm(lol): + """Make a SDM from lol.""" + return _DMQ(lol, 'SDM') + + +def DMQ_dfm(lol): + """Make a DFM from lol.""" + return _DMQ(lol, 'DFM') + + +DM_all = [DM_ddm, DM_sdm, DM_dfm] +DMZ_all = [DMZ_ddm, DMZ_sdm, DMZ_dfm] +DMQ_all = [DMQ_ddm, DMQ_sdm, DMQ_dfm] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XDM_getitem(DM): + """Test getitem for DDM, etc.""" + + lol = [[0, 1], [2, 0]] + A = DM(lol) + m, n = A.shape + + indices = [-3, -2, -1, 0, 1, 2] + + for i in indices: + for j in indices: + if -2 <= i < m and -2 <= j < n: + assert A.getitem(i, j) == ZZ(lol[i][j]) + else: + raises(IndexError, lambda: A.getitem(i, j)) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XDM_setitem(DM): + """Test setitem for DDM, etc.""" + + A = DM([[0, 1, 2], [3, 4, 5]]) + + A.setitem(0, 0, ZZ(6)) + assert A == DM([[6, 1, 2], [3, 4, 5]]) + + A.setitem(0, 1, ZZ(7)) + assert A == DM([[6, 7, 2], [3, 4, 5]]) + + A.setitem(0, 2, ZZ(8)) + assert A == DM([[6, 7, 8], [3, 4, 5]]) + + A.setitem(0, -1, ZZ(9)) + assert A == DM([[6, 7, 9], [3, 4, 5]]) + + A.setitem(0, -2, ZZ(10)) + assert A == DM([[6, 10, 9], [3, 4, 5]]) + + A.setitem(0, -3, ZZ(11)) + assert A == DM([[11, 10, 9], [3, 4, 5]]) + + raises(IndexError, lambda: A.setitem(0, 3, ZZ(12))) + raises(IndexError, lambda: A.setitem(0, -4, ZZ(13))) + + A.setitem(1, 0, ZZ(14)) + assert A == DM([[11, 10, 9], [14, 4, 5]]) + + A.setitem(1, 1, ZZ(15)) + assert A == DM([[11, 10, 9], [14, 15, 5]]) + + A.setitem(-1, 1, ZZ(16)) + assert A == DM([[11, 10, 9], [14, 16, 5]]) + + A.setitem(-2, 1, ZZ(17)) + assert A == DM([[11, 17, 9], [14, 16, 5]]) + + raises(IndexError, lambda: A.setitem(2, 0, ZZ(18))) + raises(IndexError, lambda: A.setitem(-3, 0, ZZ(19))) + + A.setitem(1, 2, ZZ(0)) + assert A == DM([[11, 17, 9], [14, 16, 0]]) + + A.setitem(1, -2, ZZ(0)) + assert A == DM([[11, 17, 9], [14, 0, 0]]) + + A.setitem(1, -3, ZZ(0)) + assert A == DM([[11, 17, 9], [0, 0, 0]]) + + A.setitem(0, 0, ZZ(0)) + assert A == DM([[0, 17, 9], [0, 0, 0]]) + + A.setitem(0, -1, ZZ(0)) + assert A == DM([[0, 17, 0], [0, 0, 0]]) + + A.setitem(0, 0, ZZ(0)) + assert A == DM([[0, 17, 0], [0, 0, 0]]) + + A.setitem(0, -2, ZZ(0)) + assert A == DM([[0, 0, 0], [0, 0, 0]]) + + A.setitem(0, -3, ZZ(1)) + assert A == DM([[1, 0, 0], [0, 0, 0]]) + + +class _Sliced: + def __getitem__(self, item): + return item + + +_slice = _Sliced() + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_extract_slice(DM): + A = DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert A.extract_slice(*_slice[:,:]) == A + assert A.extract_slice(*_slice[1:,:]) == DM([[4, 5, 6], [7, 8, 9]]) + assert A.extract_slice(*_slice[1:,1:]) == DM([[5, 6], [8, 9]]) + assert A.extract_slice(*_slice[1:,:-1]) == DM([[4, 5], [7, 8]]) + assert A.extract_slice(*_slice[1:,:-1:2]) == DM([[4], [7]]) + assert A.extract_slice(*_slice[:,::2]) == DM([[1, 3], [4, 6], [7, 9]]) + assert A.extract_slice(*_slice[::2,:]) == DM([[1, 2, 3], [7, 8, 9]]) + assert A.extract_slice(*_slice[::2,::2]) == DM([[1, 3], [7, 9]]) + assert A.extract_slice(*_slice[::2,::-2]) == DM([[3, 1], [9, 7]]) + assert A.extract_slice(*_slice[::-2,::2]) == DM([[7, 9], [1, 3]]) + assert A.extract_slice(*_slice[::-2,::-2]) == DM([[9, 7], [3, 1]]) + assert A.extract_slice(*_slice[:,::-1]) == DM([[3, 2, 1], [6, 5, 4], [9, 8, 7]]) + assert A.extract_slice(*_slice[::-1,:]) == DM([[7, 8, 9], [4, 5, 6], [1, 2, 3]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_extract(DM): + + A = DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + + assert A.extract([0, 1, 2], [0, 1, 2]) == A + assert A.extract([1, 2], [1, 2]) == DM([[5, 6], [8, 9]]) + assert A.extract([1, 2], [0, 1]) == DM([[4, 5], [7, 8]]) + assert A.extract([1, 2], [0, 2]) == DM([[4, 6], [7, 9]]) + assert A.extract([1, 2], [0]) == DM([[4], [7]]) + assert A.extract([1, 2], []) == DM([[1]]).zeros((2, 0), ZZ) + assert A.extract([], [0, 1, 2]) == DM([[1]]).zeros((0, 3), ZZ) + + raises(IndexError, lambda: A.extract([1, 2], [0, 3])) + raises(IndexError, lambda: A.extract([1, 2], [0, -4])) + raises(IndexError, lambda: A.extract([3, 1], [0, 1])) + raises(IndexError, lambda: A.extract([-4, 2], [3, 1])) + + B = DM([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + assert B.extract([1, 2], [1, 2]) == DM([[0, 0], [0, 0]]) + + +def test_XXM_str(): + + A = DomainMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]], (3, 3), ZZ) + + assert str(A) == \ + 'DomainMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]], (3, 3), ZZ)' + assert str(A.to_ddm()) == \ + '[[1, 2, 3], [4, 5, 6], [7, 8, 9]]' + assert str(A.to_sdm()) == \ + '{0: {0: 1, 1: 2, 2: 3}, 1: {0: 4, 1: 5, 2: 6}, 2: {0: 7, 1: 8, 2: 9}}' + + assert repr(A) == \ + 'DomainMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]], (3, 3), ZZ)' + assert repr(A.to_ddm()) == \ + 'DDM([[1, 2, 3], [4, 5, 6], [7, 8, 9]], (3, 3), ZZ)' + assert repr(A.to_sdm()) == \ + 'SDM({0: {0: 1, 1: 2, 2: 3}, 1: {0: 4, 1: 5, 2: 6}, 2: {0: 7, 1: 8, 2: 9}}, (3, 3), ZZ)' + + B = DomainMatrix({0: {0: ZZ(1), 1: ZZ(2)}, 1: {0: ZZ(3)}}, (2, 2), ZZ) + + assert str(B) == \ + 'DomainMatrix({0: {0: 1, 1: 2}, 1: {0: 3}}, (2, 2), ZZ)' + assert str(B.to_ddm()) == \ + '[[1, 2], [3, 0]]' + assert str(B.to_sdm()) == \ + '{0: {0: 1, 1: 2}, 1: {0: 3}}' + + assert repr(B) == \ + 'DomainMatrix({0: {0: 1, 1: 2}, 1: {0: 3}}, (2, 2), ZZ)' + + if GROUND_TYPES != 'gmpy': + assert repr(B.to_ddm()) == \ + 'DDM([[1, 2], [3, 0]], (2, 2), ZZ)' + assert repr(B.to_sdm()) == \ + 'SDM({0: {0: 1, 1: 2}, 1: {0: 3}}, (2, 2), ZZ)' + else: + assert repr(B.to_ddm()) == \ + 'DDM([[mpz(1), mpz(2)], [mpz(3), mpz(0)]], (2, 2), ZZ)' + assert repr(B.to_sdm()) == \ + 'SDM({0: {0: mpz(1), 1: mpz(2)}, 1: {0: mpz(3)}}, (2, 2), ZZ)' + + if GROUND_TYPES == 'flint': + + assert str(A.to_dfm()) == \ + '[[1, 2, 3], [4, 5, 6], [7, 8, 9]]' + assert str(B.to_dfm()) == \ + '[[1, 2], [3, 0]]' + + assert repr(A.to_dfm()) == \ + 'DFM([[1, 2, 3], [4, 5, 6], [7, 8, 9]], (3, 3), ZZ)' + assert repr(B.to_dfm()) == \ + 'DFM([[1, 2], [3, 0]], (2, 2), ZZ)' + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_list(DM): + T = type(DM([[0]])) + + lol = [[1, 2, 4], [4, 5, 6]] + lol_ZZ = [[ZZ(1), ZZ(2), ZZ(4)], [ZZ(4), ZZ(5), ZZ(6)]] + lol_ZZ_bad = [[ZZ(1), ZZ(2), ZZ(4)], [ZZ(4), ZZ(5), ZZ(6), ZZ(7)]] + + assert T.from_list(lol_ZZ, (2, 3), ZZ) == DM(lol) + raises(DMBadInputError, lambda: T.from_list(lol_ZZ_bad, (3, 2), ZZ)) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_to_list(DM): + lol = [[1, 2, 4], [4, 5, 6]] + assert DM(lol).to_list() == [[ZZ(1), ZZ(2), ZZ(4)], [ZZ(4), ZZ(5), ZZ(6)]] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_to_list_flat(DM): + lol = [[1, 2, 4], [4, 5, 6]] + assert DM(lol).to_list_flat() == [ZZ(1), ZZ(2), ZZ(4), ZZ(4), ZZ(5), ZZ(6)] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_list_flat(DM): + T = type(DM([[0]])) + flat = [ZZ(1), ZZ(2), ZZ(4), ZZ(4), ZZ(5), ZZ(6)] + assert T.from_list_flat(flat, (2, 3), ZZ) == DM([[1, 2, 4], [4, 5, 6]]) + raises(DMBadInputError, lambda: T.from_list_flat(flat, (3, 3), ZZ)) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_to_flat_nz(DM): + M = DM([[1, 2, 0], [0, 0, 0], [0, 0, 3]]) + elements = [ZZ(1), ZZ(2), ZZ(3)] + indices = ((0, 0), (0, 1), (2, 2)) + assert M.to_flat_nz() == (elements, (indices, M.shape)) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_flat_nz(DM): + T = type(DM([[0]])) + elements = [ZZ(1), ZZ(2), ZZ(3)] + indices = ((0, 0), (0, 1), (2, 2)) + data = (indices, (3, 3)) + result = DM([[1, 2, 0], [0, 0, 0], [0, 0, 3]]) + assert T.from_flat_nz(elements, data, ZZ) == result + raises(DMBadInputError, lambda: T.from_flat_nz(elements, (indices, (2, 3)), ZZ)) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_to_dod(DM): + dod = {0: {0: ZZ(1), 2: ZZ(4)}, 1: {0: ZZ(4), 1: ZZ(5), 2: ZZ(6)}} + assert DM([[1, 0, 4], [4, 5, 6]]).to_dod() == dod + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_dod(DM): + T = type(DM([[0]])) + dod = {0: {0: ZZ(1), 2: ZZ(4)}, 1: {0: ZZ(4), 1: ZZ(5), 2: ZZ(6)}} + assert T.from_dod(dod, (2, 3), ZZ) == DM([[1, 0, 4], [4, 5, 6]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_to_dok(DM): + dod = {(0, 0): ZZ(1), (0, 2): ZZ(4), + (1, 0): ZZ(4), (1, 1): ZZ(5), (1, 2): ZZ(6)} + assert DM([[1, 0, 4], [4, 5, 6]]).to_dok() == dod + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_dok(DM): + T = type(DM([[0]])) + dod = {(0, 0): ZZ(1), (0, 2): ZZ(4), + (1, 0): ZZ(4), (1, 1): ZZ(5), (1, 2): ZZ(6)} + assert T.from_dok(dod, (2, 3), ZZ) == DM([[1, 0, 4], [4, 5, 6]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_iter_values(DM): + values = [ZZ(1), ZZ(4), ZZ(4), ZZ(5), ZZ(6)] + assert sorted(DM([[1, 0, 4], [4, 5, 6]]).iter_values()) == values + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_iter_items(DM): + items = [((0, 0), ZZ(1)), ((0, 2), ZZ(4)), + ((1, 0), ZZ(4)), ((1, 1), ZZ(5)), ((1, 2), ZZ(6))] + assert sorted(DM([[1, 0, 4], [4, 5, 6]]).iter_items()) == items + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_from_ddm(DM): + T = type(DM([[0]])) + ddm = DDM([[1, 2, 4], [4, 5, 6]], (2, 3), ZZ) + assert T.from_ddm(ddm) == DM([[1, 2, 4], [4, 5, 6]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_zeros(DM): + T = type(DM([[0]])) + assert T.zeros((2, 3), ZZ) == DM([[0, 0, 0], [0, 0, 0]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_ones(DM): + T = type(DM([[0]])) + assert T.ones((2, 3), ZZ) == DM([[1, 1, 1], [1, 1, 1]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_eye(DM): + T = type(DM([[0]])) + assert T.eye(3, ZZ) == DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]]) + assert T.eye((3, 2), ZZ) == DM([[1, 0], [0, 1], [0, 0]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_diag(DM): + T = type(DM([[0]])) + assert T.diag([1, 2, 3], ZZ) == DM([[1, 0, 0], [0, 2, 0], [0, 0, 3]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_transpose(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + assert A.transpose() == DM([[1, 4], [2, 5], [3, 6]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_add(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[1, 2, 3], [4, 5, 6]]) + C = DM([[2, 4, 6], [8, 10, 12]]) + assert A.add(B) == C + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_sub(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[1, 2, 3], [4, 5, 6]]) + C = DM([[0, 0, 0], [0, 0, 0]]) + assert A.sub(B) == C + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_mul(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + b = ZZ(2) + assert A.mul(b) == DM([[2, 4, 6], [8, 10, 12]]) + assert A.rmul(b) == DM([[2, 4, 6], [8, 10, 12]]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_matmul(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[1, 2], [3, 4], [5, 6]]) + C = DM([[22, 28], [49, 64]]) + assert A.matmul(B) == C + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_mul_elementwise(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[1, 2, 3], [4, 5, 6]]) + C = DM([[1, 4, 9], [16, 25, 36]]) + assert A.mul_elementwise(B) == C + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_neg(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + C = DM([[-1, -2, -3], [-4, -5, -6]]) + assert A.neg() == C + + +@pytest.mark.parametrize('DM', DM_all) +def test_XXM_convert_to(DM): + A = DM([[1, 2, 3], [4, 5, 6]], ZZ) + B = DM([[1, 2, 3], [4, 5, 6]], QQ) + assert A.convert_to(QQ) == B + assert B.convert_to(ZZ) == A + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_scc(DM): + A = DM([ + [0, 1, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 0], + [0, 0, 1, 0, 0, 0], + [0, 0, 0, 1, 0, 1], + [0, 0, 0, 0, 1, 0], + [0, 0, 0, 1, 0, 1]]) + assert A.scc() == [[0, 1], [2], [3, 5], [4]] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_hstack(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[7, 8], [9, 10]]) + C = DM([[1, 2, 3, 7, 8], [4, 5, 6, 9, 10]]) + ABC = DM([[1, 2, 3, 7, 8, 1, 2, 3, 7, 8], + [4, 5, 6, 9, 10, 4, 5, 6, 9, 10]]) + assert A.hstack(B) == C + assert A.hstack(B, C) == ABC + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_vstack(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[7, 8, 9]]) + C = DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + ABC = DM([[1, 2, 3], [4, 5, 6], [7, 8, 9], [1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert A.vstack(B) == C + assert A.vstack(B, C) == ABC + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_applyfunc(DM): + A = DM([[1, 2, 3], [4, 5, 6]]) + B = DM([[2, 4, 6], [8, 10, 12]]) + assert A.applyfunc(lambda x: 2*x, ZZ) == B + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_is_upper(DM): + assert DM([[1, 2, 3], [0, 5, 6]]).is_upper() is True + assert DM([[1, 2, 3], [4, 5, 6]]).is_upper() is False + assert DM([]).is_upper() is True + assert DM([[], []]).is_upper() is True + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_is_lower(DM): + assert DM([[1, 0, 0], [4, 5, 0]]).is_lower() is True + assert DM([[1, 2, 3], [4, 5, 6]]).is_lower() is False + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_is_diagonal(DM): + assert DM([[1, 0, 0], [0, 5, 0]]).is_diagonal() is True + assert DM([[1, 2, 3], [4, 5, 6]]).is_diagonal() is False + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_diagonal(DM): + assert DM([[1, 0, 0], [0, 5, 0]]).diagonal() == [1, 5] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_is_zero_matrix(DM): + assert DM([[0, 0, 0], [0, 0, 0]]).is_zero_matrix() is True + assert DM([[1, 0, 0], [0, 0, 0]]).is_zero_matrix() is False + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_det_ZZ(DM): + assert DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]]).det() == 0 + assert DM([[1, 2, 3], [4, 5, 6], [7, 8, 10]]).det() == -3 + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_det_QQ(DM): + dM1 = DM([[(1,2), (2,3)], [(3,4), (4,5)]]) + assert dM1.det() == QQ(-1,10) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_inv_QQ(DM): + dM1 = DM([[(1,2), (2,3)], [(3,4), (4,5)]]) + dM2 = DM([[(-8,1), (20,3)], [(15,2), (-5,1)]]) + assert dM1.inv() == dM2 + assert dM1.matmul(dM2) == DM([[1, 0], [0, 1]]) + + dM3 = DM([[(1,2), (2,3)], [(1,4), (1,3)]]) + raises(DMNonInvertibleMatrixError, lambda: dM3.inv()) + + dM4 = DM([[(1,2), (2,3), (3,4)], [(1,4), (1,3), (1,2)]]) + raises(DMNonSquareMatrixError, lambda: dM4.inv()) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_inv_ZZ(DM): + dM1 = DM([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + # XXX: Maybe this should return a DM over QQ instead? + # XXX: Handle unimodular matrices? + raises(DMDomainError, lambda: dM1.inv()) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_charpoly_ZZ(DM): + dM1 = DM([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + assert dM1.charpoly() == [1, -16, -12, 3] + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_charpoly_QQ(DM): + dM1 = DM([[(1,2), (2,3)], [(3,4), (4,5)]]) + assert dM1.charpoly() == [QQ(1,1), QQ(-13,10), QQ(-1,10)] + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_lu_solve_ZZ(DM): + dM1 = DM([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + dM2 = DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]]) + raises(DMDomainError, lambda: dM1.lu_solve(dM2)) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_lu_solve_QQ(DM): + dM1 = DM([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + dM2 = DM([[1, 0, 0], [0, 1, 0], [0, 0, 1]]) + dM3 = DM([[(-2,3),(-4,3),(1,1)],[(-2,3),(11,3),(-2,1)],[(1,1),(-2,1),(1,1)]]) + assert dM1.lu_solve(dM2) == dM3 == dM1.inv() + + dM4 = DM([[1, 2, 3], [4, 5, 6]]) + dM5 = DM([[1, 0], [0, 1], [0, 0]]) + raises(DMShapeError, lambda: dM4.lu_solve(dM5)) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_nullspace_QQ(DM): + dM1 = DM([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + # XXX: Change the signature to just return the nullspace. Possibly + # returning the rank or nullity makes sense but the list of nonpivots is + # not useful. + assert dM1.nullspace() == (DM([[1, -2, 1]]), [2]) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_lll(DM): + M = DM([[1, 2, 3], [4, 5, 20]]) + M_lll = DM([[1, 2, 3], [-1, -5, 5]]) + T = DM([[1, 0], [-5, 1]]) + assert M.lll() == M_lll + assert M.lll_transform() == (M_lll, T) + assert T.matmul(M) == M_lll + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_mixed_signs(DM): + lol = [[QQ(1), QQ(-2)], [QQ(-3), QQ(4)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_large_matrix(DM): + lol = [[QQ(i + j) for j in range(10)] for i in range(10)] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_identity_matrix(DM): + T = type(DM([[0]])) + A = T.eye(3, QQ) + Q, R = A.qr() + assert Q == A + assert R == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + assert Q.shape == (3, 3) + assert R.shape == (3, 3) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_square_matrix(DM): + lol = [[QQ(3), QQ(1)], [QQ(4), QQ(3)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_matrix_with_zero_columns(DM): + lol = [[QQ(3), QQ(0)], [QQ(4), QQ(0)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_linearly_dependent_columns(DM): + lol = [[QQ(1), QQ(2)], [QQ(2), QQ(4)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_qr_non_field(DM): + lol = [[ZZ(3), ZZ(1)], [ZZ(4), ZZ(3)]] + A = DM(lol) + with pytest.raises(DMDomainError): + A.qr() + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_field(DM): + lol = [[QQ(3), QQ(1)], [QQ(4), QQ(3)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_tall_matrix(DM): + lol = [[QQ(1), QQ(2)], [QQ(3), QQ(4)], [QQ(5), QQ(6)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_wide_matrix(DM): + lol = [[QQ(1), QQ(2), QQ(3)], [QQ(4), QQ(5), QQ(6)]] + A = DM(lol) + Q, R = A.qr() + assert Q.matmul(R) == A + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_empty_matrix_0x0(DM): + T = type(DM([[0]])) + A = T.zeros((0, 0), QQ) + Q, R = A.qr() + assert Q.matmul(R).shape == A.shape + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + assert Q.shape == (0, 0) + assert R.shape == (0, 0) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_empty_matrix_2x0(DM): + T = type(DM([[0]])) + A = T.zeros((2, 0), QQ) + Q, R = A.qr() + assert Q.matmul(R).shape == A.shape + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + assert Q.shape == (2, 0) + assert R.shape == (0, 0) + + +@pytest.mark.parametrize('DM', DMQ_all) +def test_XXM_qr_empty_matrix_0x2(DM): + T = type(DM([[0]])) + A = T.zeros((0, 2), QQ) + Q, R = A.qr() + assert Q.matmul(R).shape == A.shape + assert (Q.transpose().matmul(Q)).is_diagonal + assert R.is_upper + assert Q.shape == (0, 0) + assert R.shape == (0, 2) + + +@pytest.mark.parametrize('DM', DMZ_all) +def test_XXM_fflu(DM): + A = DM([[1, 2], [3, 4]]) + P, L, D, U = A.fflu() + A_field = A.convert_to(QQ) + P_field = P.convert_to(QQ) + L_field = L.convert_to(QQ) + D_field = D.convert_to(QQ) + U_field = U.convert_to(QQ) + assert P.shape == A.shape + assert L.shape == A.shape + assert D.shape == A.shape + assert U.shape == A.shape + assert P == DM([[1, 0], [0, 1]]) + assert L == DM([[1, 0], [3, -2]]) + assert D == DM([[1, 0], [0, -2]]) + assert U == DM([[1, 2], [0, -2]]) + assert L_field.matmul(D_field.inv()).matmul(U_field) == P_field.matmul(A_field) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/modulargcd.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/modulargcd.py new file mode 100644 index 0000000000000000000000000000000000000000..6f0012316c499cfde85f56c5c37a3475f4175a4e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/modulargcd.py @@ -0,0 +1,2278 @@ +from sympy.core.symbol import Dummy +from sympy.ntheory import nextprime +from sympy.ntheory.modular import crt +from sympy.polys.domains import PolynomialRing +from sympy.polys.galoistools import ( + gf_gcd, gf_from_dict, gf_gcdex, gf_div, gf_lcm) +from sympy.polys.polyerrors import ModularGCDFailed + +from mpmath import sqrt +import random + + +def _trivial_gcd(f, g): + """ + Compute the GCD of two polynomials in trivial cases, i.e. when one + or both polynomials are zero. + """ + ring = f.ring + + if not (f or g): + return ring.zero, ring.zero, ring.zero + elif not f: + if g.LC < ring.domain.zero: + return -g, ring.zero, -ring.one + else: + return g, ring.zero, ring.one + elif not g: + if f.LC < ring.domain.zero: + return -f, -ring.one, ring.zero + else: + return f, ring.one, ring.zero + return None + + +def _gf_gcd(fp, gp, p): + r""" + Compute the GCD of two univariate polynomials in `\mathbb{Z}_p[x]`. + """ + dom = fp.ring.domain + + while gp: + rem = fp + deg = gp.degree() + lcinv = dom.invert(gp.LC, p) + + while True: + degrem = rem.degree() + if degrem < deg: + break + rem = (rem - gp.mul_monom((degrem - deg,)).mul_ground(lcinv * rem.LC)).trunc_ground(p) + + fp = gp + gp = rem + + return fp.mul_ground(dom.invert(fp.LC, p)).trunc_ground(p) + + +def _degree_bound_univariate(f, g): + r""" + Compute an upper bound for the degree of the GCD of two univariate + integer polynomials `f` and `g`. + + The function chooses a suitable prime `p` and computes the GCD of + `f` and `g` in `\mathbb{Z}_p[x]`. The choice of `p` guarantees that + the degree in `\mathbb{Z}_p[x]` is greater than or equal to the degree + in `\mathbb{Z}[x]`. + + Parameters + ========== + + f : PolyElement + univariate integer polynomial + g : PolyElement + univariate integer polynomial + + """ + gamma = f.ring.domain.gcd(f.LC, g.LC) + p = 1 + + p = nextprime(p) + while gamma % p == 0: + p = nextprime(p) + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + hp = _gf_gcd(fp, gp, p) + deghp = hp.degree() + return deghp + + +def _chinese_remainder_reconstruction_univariate(hp, hq, p, q): + r""" + Construct a polynomial `h_{pq}` in `\mathbb{Z}_{p q}[x]` such that + + .. math :: + + h_{pq} = h_p \; \mathrm{mod} \, p + + h_{pq} = h_q \; \mathrm{mod} \, q + + for relatively prime integers `p` and `q` and polynomials + `h_p` and `h_q` in `\mathbb{Z}_p[x]` and `\mathbb{Z}_q[x]` + respectively. + + The coefficients of the polynomial `h_{pq}` are computed with the + Chinese Remainder Theorem. The symmetric representation in + `\mathbb{Z}_p[x]`, `\mathbb{Z}_q[x]` and `\mathbb{Z}_{p q}[x]` is used. + It is assumed that `h_p` and `h_q` have the same degree. + + Parameters + ========== + + hp : PolyElement + univariate integer polynomial with coefficients in `\mathbb{Z}_p` + hq : PolyElement + univariate integer polynomial with coefficients in `\mathbb{Z}_q` + p : Integer + modulus of `h_p`, relatively prime to `q` + q : Integer + modulus of `h_q`, relatively prime to `p` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _chinese_remainder_reconstruction_univariate + >>> from sympy.polys import ring, ZZ + + >>> R, x = ring("x", ZZ) + >>> p = 3 + >>> q = 5 + + >>> hp = -x**3 - 1 + >>> hq = 2*x**3 - 2*x**2 + x + + >>> hpq = _chinese_remainder_reconstruction_univariate(hp, hq, p, q) + >>> hpq + 2*x**3 + 3*x**2 + 6*x + 5 + + >>> hpq.trunc_ground(p) == hp + True + >>> hpq.trunc_ground(q) == hq + True + + """ + n = hp.degree() + x = hp.ring.gens[0] + hpq = hp.ring.zero + + for i in range(n+1): + hpq[(i,)] = crt([p, q], [hp.coeff(x**i), hq.coeff(x**i)], symmetric=True)[0] + + hpq.strip_zero() + return hpq + + +def modgcd_univariate(f, g): + r""" + Computes the GCD of two polynomials in `\mathbb{Z}[x]` using a modular + algorithm. + + The algorithm computes the GCD of two univariate integer polynomials + `f` and `g` by computing the GCD in `\mathbb{Z}_p[x]` for suitable + primes `p` and then reconstructing the coefficients with the Chinese + Remainder Theorem. Trial division is only made for candidates which + are very likely the desired GCD. + + Parameters + ========== + + f : PolyElement + univariate integer polynomial + g : PolyElement + univariate integer polynomial + + Returns + ======= + + h : PolyElement + GCD of the polynomials `f` and `g` + cff : PolyElement + cofactor of `f`, i.e. `\frac{f}{h}` + cfg : PolyElement + cofactor of `g`, i.e. `\frac{g}{h}` + + Examples + ======== + + >>> from sympy.polys.modulargcd import modgcd_univariate + >>> from sympy.polys import ring, ZZ + + >>> R, x = ring("x", ZZ) + + >>> f = x**5 - 1 + >>> g = x - 1 + + >>> h, cff, cfg = modgcd_univariate(f, g) + >>> h, cff, cfg + (x - 1, x**4 + x**3 + x**2 + x + 1, 1) + + >>> cff * h == f + True + >>> cfg * h == g + True + + >>> f = 6*x**2 - 6 + >>> g = 2*x**2 + 4*x + 2 + + >>> h, cff, cfg = modgcd_univariate(f, g) + >>> h, cff, cfg + (2*x + 2, 3*x - 3, x + 1) + + >>> cff * h == f + True + >>> cfg * h == g + True + + References + ========== + + 1. [Monagan00]_ + + """ + assert f.ring == g.ring and f.ring.domain.is_ZZ + + result = _trivial_gcd(f, g) + if result is not None: + return result + + ring = f.ring + + cf, f = f.primitive() + cg, g = g.primitive() + ch = ring.domain.gcd(cf, cg) + + bound = _degree_bound_univariate(f, g) + if bound == 0: + return ring(ch), f.mul_ground(cf // ch), g.mul_ground(cg // ch) + + gamma = ring.domain.gcd(f.LC, g.LC) + m = 1 + p = 1 + + while True: + p = nextprime(p) + while gamma % p == 0: + p = nextprime(p) + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + hp = _gf_gcd(fp, gp, p) + deghp = hp.degree() + + if deghp > bound: + continue + elif deghp < bound: + m = 1 + bound = deghp + continue + + hp = hp.mul_ground(gamma).trunc_ground(p) + if m == 1: + m = p + hlastm = hp + continue + + hm = _chinese_remainder_reconstruction_univariate(hp, hlastm, p, m) + m *= p + + if not hm == hlastm: + hlastm = hm + continue + + h = hm.quo_ground(hm.content()) + fquo, frem = f.div(h) + gquo, grem = g.div(h) + if not frem and not grem: + if h.LC < 0: + ch = -ch + h = h.mul_ground(ch) + cff = fquo.mul_ground(cf // ch) + cfg = gquo.mul_ground(cg // ch) + return h, cff, cfg + + +def _primitive(f, p): + r""" + Compute the content and the primitive part of a polynomial in + `\mathbb{Z}_p[x_0, \ldots, x_{k-2}, y] \cong \mathbb{Z}_p[y][x_0, \ldots, x_{k-2}]`. + + Parameters + ========== + + f : PolyElement + integer polynomial in `\mathbb{Z}_p[x0, \ldots, x{k-2}, y]` + p : Integer + modulus of `f` + + Returns + ======= + + contf : PolyElement + integer polynomial in `\mathbb{Z}_p[y]`, content of `f` + ppf : PolyElement + primitive part of `f`, i.e. `\frac{f}{contf}` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _primitive + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + >>> p = 3 + + >>> f = x**2*y**2 + x**2*y - y**2 - y + >>> _primitive(f, p) + (y**2 + y, x**2 - 1) + + >>> R, x, y, z = ring("x, y, z", ZZ) + + >>> f = x*y*z - y**2*z**2 + >>> _primitive(f, p) + (z, x*y - y**2*z) + + """ + ring = f.ring + dom = ring.domain + k = ring.ngens + + coeffs = {} + for monom, coeff in f.iterterms(): + if monom[:-1] not in coeffs: + coeffs[monom[:-1]] = {} + coeffs[monom[:-1]][monom[-1]] = coeff + + cont = [] + for coeff in iter(coeffs.values()): + cont = gf_gcd(cont, gf_from_dict(coeff, p, dom), p, dom) + + yring = ring.clone(symbols=ring.symbols[k-1]) + contf = yring.from_dense(cont).trunc_ground(p) + + return contf, f.quo(contf.set_ring(ring)) + + +def _deg(f): + r""" + Compute the degree of a multivariate polynomial + `f \in K[x_0, \ldots, x_{k-2}, y] \cong K[y][x_0, \ldots, x_{k-2}]`. + + Parameters + ========== + + f : PolyElement + polynomial in `K[x_0, \ldots, x_{k-2}, y]` + + Returns + ======= + + degf : Integer tuple + degree of `f` in `x_0, \ldots, x_{k-2}` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _deg + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2*y**2 + x**2*y - 1 + >>> _deg(f) + (2,) + + >>> R, x, y, z = ring("x, y, z", ZZ) + + >>> f = x**2*y**2 + x**2*y - 1 + >>> _deg(f) + (2, 2) + + >>> f = x*y*z - y**2*z**2 + >>> _deg(f) + (1, 1) + + """ + k = f.ring.ngens + degf = (0,) * (k-1) + for monom in f.itermonoms(): + if monom[:-1] > degf: + degf = monom[:-1] + return degf + + +def _LC(f): + r""" + Compute the leading coefficient of a multivariate polynomial + `f \in K[x_0, \ldots, x_{k-2}, y] \cong K[y][x_0, \ldots, x_{k-2}]`. + + Parameters + ========== + + f : PolyElement + polynomial in `K[x_0, \ldots, x_{k-2}, y]` + + Returns + ======= + + lcf : PolyElement + polynomial in `K[y]`, leading coefficient of `f` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _LC + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2*y**2 + x**2*y - 1 + >>> _LC(f) + y**2 + y + + >>> R, x, y, z = ring("x, y, z", ZZ) + + >>> f = x**2*y**2 + x**2*y - 1 + >>> _LC(f) + 1 + + >>> f = x*y*z - y**2*z**2 + >>> _LC(f) + z + + """ + ring = f.ring + k = ring.ngens + yring = ring.clone(symbols=ring.symbols[k-1]) + y = yring.gens[0] + degf = _deg(f) + + lcf = yring.zero + for monom, coeff in f.iterterms(): + if monom[:-1] == degf: + lcf += coeff*y**monom[-1] + return lcf + + +def _swap(f, i): + """ + Make the variable `x_i` the leading one in a multivariate polynomial `f`. + """ + ring = f.ring + fswap = ring.zero + for monom, coeff in f.iterterms(): + monomswap = (monom[i],) + monom[:i] + monom[i+1:] + fswap[monomswap] = coeff + return fswap + + +def _degree_bound_bivariate(f, g): + r""" + Compute upper degree bounds for the GCD of two bivariate + integer polynomials `f` and `g`. + + The GCD is viewed as a polynomial in `\mathbb{Z}[y][x]` and the + function returns an upper bound for its degree and one for the degree + of its content. This is done by choosing a suitable prime `p` and + computing the GCD of the contents of `f \; \mathrm{mod} \, p` and + `g \; \mathrm{mod} \, p`. The choice of `p` guarantees that the degree + of the content in `\mathbb{Z}_p[y]` is greater than or equal to the + degree in `\mathbb{Z}[y]`. To obtain the degree bound in the variable + `x`, the polynomials are evaluated at `y = a` for a suitable + `a \in \mathbb{Z}_p` and then their GCD in `\mathbb{Z}_p[x]` is + computed. If no such `a` exists, i.e. the degree in `\mathbb{Z}_p[x]` + is always smaller than the one in `\mathbb{Z}[y][x]`, then the bound is + set to the minimum of the degrees of `f` and `g` in `x`. + + Parameters + ========== + + f : PolyElement + bivariate integer polynomial + g : PolyElement + bivariate integer polynomial + + Returns + ======= + + xbound : Integer + upper bound for the degree of the GCD of the polynomials `f` and + `g` in the variable `x` + ycontbound : Integer + upper bound for the degree of the content of the GCD of the + polynomials `f` and `g` in the variable `y` + + References + ========== + + 1. [Monagan00]_ + + """ + ring = f.ring + + gamma1 = ring.domain.gcd(f.LC, g.LC) + gamma2 = ring.domain.gcd(_swap(f, 1).LC, _swap(g, 1).LC) + badprimes = gamma1 * gamma2 + p = 1 + + p = nextprime(p) + while badprimes % p == 0: + p = nextprime(p) + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + contfp, fp = _primitive(fp, p) + contgp, gp = _primitive(gp, p) + conthp = _gf_gcd(contfp, contgp, p) # polynomial in Z_p[y] + ycontbound = conthp.degree() + + # polynomial in Z_p[y] + delta = _gf_gcd(_LC(fp), _LC(gp), p) + + for a in range(p): + if not delta.evaluate(0, a) % p: + continue + fpa = fp.evaluate(1, a).trunc_ground(p) + gpa = gp.evaluate(1, a).trunc_ground(p) + hpa = _gf_gcd(fpa, gpa, p) + xbound = hpa.degree() + return xbound, ycontbound + + return min(fp.degree(), gp.degree()), ycontbound + + +def _chinese_remainder_reconstruction_multivariate(hp, hq, p, q): + r""" + Construct a polynomial `h_{pq}` in + `\mathbb{Z}_{p q}[x_0, \ldots, x_{k-1}]` such that + + .. math :: + + h_{pq} = h_p \; \mathrm{mod} \, p + + h_{pq} = h_q \; \mathrm{mod} \, q + + for relatively prime integers `p` and `q` and polynomials + `h_p` and `h_q` in `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]` and + `\mathbb{Z}_q[x_0, \ldots, x_{k-1}]` respectively. + + The coefficients of the polynomial `h_{pq}` are computed with the + Chinese Remainder Theorem. The symmetric representation in + `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]`, + `\mathbb{Z}_q[x_0, \ldots, x_{k-1}]` and + `\mathbb{Z}_{p q}[x_0, \ldots, x_{k-1}]` is used. + + Parameters + ========== + + hp : PolyElement + multivariate integer polynomial with coefficients in `\mathbb{Z}_p` + hq : PolyElement + multivariate integer polynomial with coefficients in `\mathbb{Z}_q` + p : Integer + modulus of `h_p`, relatively prime to `q` + q : Integer + modulus of `h_q`, relatively prime to `p` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _chinese_remainder_reconstruction_multivariate + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + >>> p = 3 + >>> q = 5 + + >>> hp = x**3*y - x**2 - 1 + >>> hq = -x**3*y - 2*x*y**2 + 2 + + >>> hpq = _chinese_remainder_reconstruction_multivariate(hp, hq, p, q) + >>> hpq + 4*x**3*y + 5*x**2 + 3*x*y**2 + 2 + + >>> hpq.trunc_ground(p) == hp + True + >>> hpq.trunc_ground(q) == hq + True + + >>> R, x, y, z = ring("x, y, z", ZZ) + >>> p = 6 + >>> q = 5 + + >>> hp = 3*x**4 - y**3*z + z + >>> hq = -2*x**4 + z + + >>> hpq = _chinese_remainder_reconstruction_multivariate(hp, hq, p, q) + >>> hpq + 3*x**4 + 5*y**3*z + z + + >>> hpq.trunc_ground(p) == hp + True + >>> hpq.trunc_ground(q) == hq + True + + """ + hpmonoms = set(hp.monoms()) + hqmonoms = set(hq.monoms()) + monoms = hpmonoms.intersection(hqmonoms) + hpmonoms.difference_update(monoms) + hqmonoms.difference_update(monoms) + + domain = hp.ring.domain + zero = domain.zero + + hpq = hp.ring.zero + + if isinstance(hp.ring.domain, PolynomialRing): + crt_ = _chinese_remainder_reconstruction_multivariate + else: + def crt_(cp, cq, p, q): + return domain(crt([p, q], [cp, cq], symmetric=True)[0]) + + for monom in monoms: + hpq[monom] = crt_(hp[monom], hq[monom], p, q) + for monom in hpmonoms: + hpq[monom] = crt_(hp[monom], zero, p, q) + for monom in hqmonoms: + hpq[monom] = crt_(zero, hq[monom], p, q) + + return hpq + + +def _interpolate_multivariate(evalpoints, hpeval, ring, i, p, ground=False): + r""" + Reconstruct a polynomial `h_p` in `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]` + from a list of evaluation points in `\mathbb{Z}_p` and a list of + polynomials in + `\mathbb{Z}_p[x_0, \ldots, x_{i-1}, x_{i+1}, \ldots, x_{k-1}]`, which + are the images of `h_p` evaluated in the variable `x_i`. + + It is also possible to reconstruct a parameter of the ground domain, + i.e. if `h_p` is a polynomial over `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]`. + In this case, one has to set ``ground=True``. + + Parameters + ========== + + evalpoints : list of Integer objects + list of evaluation points in `\mathbb{Z}_p` + hpeval : list of PolyElement objects + list of polynomials in (resp. over) + `\mathbb{Z}_p[x_0, \ldots, x_{i-1}, x_{i+1}, \ldots, x_{k-1}]`, + images of `h_p` evaluated in the variable `x_i` + ring : PolyRing + `h_p` will be an element of this ring + i : Integer + index of the variable which has to be reconstructed + p : Integer + prime number, modulus of `h_p` + ground : Boolean + indicates whether `x_i` is in the ground domain, default is + ``False`` + + Returns + ======= + + hp : PolyElement + interpolated polynomial in (resp. over) + `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]` + + """ + hp = ring.zero + + if ground: + domain = ring.domain.domain + y = ring.domain.gens[i] + else: + domain = ring.domain + y = ring.gens[i] + + for a, hpa in zip(evalpoints, hpeval): + numer = ring.one + denom = domain.one + for b in evalpoints: + if b == a: + continue + + numer *= y - b + denom *= a - b + + denom = domain.invert(denom, p) + coeff = numer.mul_ground(denom) + hp += hpa.set_ring(ring) * coeff + + return hp.trunc_ground(p) + + +def modgcd_bivariate(f, g): + r""" + Computes the GCD of two polynomials in `\mathbb{Z}[x, y]` using a + modular algorithm. + + The algorithm computes the GCD of two bivariate integer polynomials + `f` and `g` by calculating the GCD in `\mathbb{Z}_p[x, y]` for + suitable primes `p` and then reconstructing the coefficients with the + Chinese Remainder Theorem. To compute the bivariate GCD over + `\mathbb{Z}_p`, the polynomials `f \; \mathrm{mod} \, p` and + `g \; \mathrm{mod} \, p` are evaluated at `y = a` for certain + `a \in \mathbb{Z}_p` and then their univariate GCD in `\mathbb{Z}_p[x]` + is computed. Interpolating those yields the bivariate GCD in + `\mathbb{Z}_p[x, y]`. To verify the result in `\mathbb{Z}[x, y]`, trial + division is done, but only for candidates which are very likely the + desired GCD. + + Parameters + ========== + + f : PolyElement + bivariate integer polynomial + g : PolyElement + bivariate integer polynomial + + Returns + ======= + + h : PolyElement + GCD of the polynomials `f` and `g` + cff : PolyElement + cofactor of `f`, i.e. `\frac{f}{h}` + cfg : PolyElement + cofactor of `g`, i.e. `\frac{g}{h}` + + Examples + ======== + + >>> from sympy.polys.modulargcd import modgcd_bivariate + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2 - y**2 + >>> g = x**2 + 2*x*y + y**2 + + >>> h, cff, cfg = modgcd_bivariate(f, g) + >>> h, cff, cfg + (x + y, x - y, x + y) + + >>> cff * h == f + True + >>> cfg * h == g + True + + >>> f = x**2*y - x**2 - 4*y + 4 + >>> g = x + 2 + + >>> h, cff, cfg = modgcd_bivariate(f, g) + >>> h, cff, cfg + (x + 2, x*y - x - 2*y + 2, 1) + + >>> cff * h == f + True + >>> cfg * h == g + True + + References + ========== + + 1. [Monagan00]_ + + """ + assert f.ring == g.ring and f.ring.domain.is_ZZ + + result = _trivial_gcd(f, g) + if result is not None: + return result + + ring = f.ring + + cf, f = f.primitive() + cg, g = g.primitive() + ch = ring.domain.gcd(cf, cg) + + xbound, ycontbound = _degree_bound_bivariate(f, g) + if xbound == ycontbound == 0: + return ring(ch), f.mul_ground(cf // ch), g.mul_ground(cg // ch) + + fswap = _swap(f, 1) + gswap = _swap(g, 1) + degyf = fswap.degree() + degyg = gswap.degree() + + ybound, xcontbound = _degree_bound_bivariate(fswap, gswap) + if ybound == xcontbound == 0: + return ring(ch), f.mul_ground(cf // ch), g.mul_ground(cg // ch) + + # TODO: to improve performance, choose the main variable here + + gamma1 = ring.domain.gcd(f.LC, g.LC) + gamma2 = ring.domain.gcd(fswap.LC, gswap.LC) + badprimes = gamma1 * gamma2 + m = 1 + p = 1 + + while True: + p = nextprime(p) + while badprimes % p == 0: + p = nextprime(p) + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + contfp, fp = _primitive(fp, p) + contgp, gp = _primitive(gp, p) + conthp = _gf_gcd(contfp, contgp, p) # monic polynomial in Z_p[y] + degconthp = conthp.degree() + + if degconthp > ycontbound: + continue + elif degconthp < ycontbound: + m = 1 + ycontbound = degconthp + continue + + # polynomial in Z_p[y] + delta = _gf_gcd(_LC(fp), _LC(gp), p) + + degcontfp = contfp.degree() + degcontgp = contgp.degree() + degdelta = delta.degree() + + N = min(degyf - degcontfp, degyg - degcontgp, + ybound - ycontbound + degdelta) + 1 + + if p < N: + continue + + n = 0 + evalpoints = [] + hpeval = [] + unlucky = False + + for a in range(p): + deltaa = delta.evaluate(0, a) + if not deltaa % p: + continue + + fpa = fp.evaluate(1, a).trunc_ground(p) + gpa = gp.evaluate(1, a).trunc_ground(p) + hpa = _gf_gcd(fpa, gpa, p) # monic polynomial in Z_p[x] + deghpa = hpa.degree() + + if deghpa > xbound: + continue + elif deghpa < xbound: + m = 1 + xbound = deghpa + unlucky = True + break + + hpa = hpa.mul_ground(deltaa).trunc_ground(p) + evalpoints.append(a) + hpeval.append(hpa) + n += 1 + + if n == N: + break + + if unlucky: + continue + if n < N: + continue + + hp = _interpolate_multivariate(evalpoints, hpeval, ring, 1, p) + + hp = _primitive(hp, p)[1] + hp = hp * conthp.set_ring(ring) + degyhp = hp.degree(1) + + if degyhp > ybound: + continue + if degyhp < ybound: + m = 1 + ybound = degyhp + continue + + hp = hp.mul_ground(gamma1).trunc_ground(p) + if m == 1: + m = p + hlastm = hp + continue + + hm = _chinese_remainder_reconstruction_multivariate(hp, hlastm, p, m) + m *= p + + if not hm == hlastm: + hlastm = hm + continue + + h = hm.quo_ground(hm.content()) + fquo, frem = f.div(h) + gquo, grem = g.div(h) + if not frem and not grem: + if h.LC < 0: + ch = -ch + h = h.mul_ground(ch) + cff = fquo.mul_ground(cf // ch) + cfg = gquo.mul_ground(cg // ch) + return h, cff, cfg + + +def _modgcd_multivariate_p(f, g, p, degbound, contbound): + r""" + Compute the GCD of two polynomials in + `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]`. + + The algorithm reduces the problem step by step by evaluating the + polynomials `f` and `g` at `x_{k-1} = a` for suitable + `a \in \mathbb{Z}_p` and then calls itself recursively to compute the GCD + in `\mathbb{Z}_p[x_0, \ldots, x_{k-2}]`. If these recursive calls are + successful for enough evaluation points, the GCD in `k` variables is + interpolated, otherwise the algorithm returns ``None``. Every time a GCD + or a content is computed, their degrees are compared with the bounds. If + a degree greater then the bound is encountered, then the current call + returns ``None`` and a new evaluation point has to be chosen. If at some + point the degree is smaller, the correspondent bound is updated and the + algorithm fails. + + Parameters + ========== + + f : PolyElement + multivariate integer polynomial with coefficients in `\mathbb{Z}_p` + g : PolyElement + multivariate integer polynomial with coefficients in `\mathbb{Z}_p` + p : Integer + prime number, modulus of `f` and `g` + degbound : list of Integer objects + ``degbound[i]`` is an upper bound for the degree of the GCD of `f` + and `g` in the variable `x_i` + contbound : list of Integer objects + ``contbound[i]`` is an upper bound for the degree of the content of + the GCD in `\mathbb{Z}_p[x_i][x_0, \ldots, x_{i-1}]`, + ``contbound[0]`` is not used can therefore be chosen + arbitrarily. + + Returns + ======= + + h : PolyElement + GCD of the polynomials `f` and `g` or ``None`` + + References + ========== + + 1. [Monagan00]_ + 2. [Brown71]_ + + """ + ring = f.ring + k = ring.ngens + + if k == 1: + h = _gf_gcd(f, g, p).trunc_ground(p) + degh = h.degree() + + if degh > degbound[0]: + return None + if degh < degbound[0]: + degbound[0] = degh + raise ModularGCDFailed + + return h + + degyf = f.degree(k-1) + degyg = g.degree(k-1) + + contf, f = _primitive(f, p) + contg, g = _primitive(g, p) + + conth = _gf_gcd(contf, contg, p) # polynomial in Z_p[y] + + degcontf = contf.degree() + degcontg = contg.degree() + degconth = conth.degree() + + if degconth > contbound[k-1]: + return None + if degconth < contbound[k-1]: + contbound[k-1] = degconth + raise ModularGCDFailed + + lcf = _LC(f) + lcg = _LC(g) + + delta = _gf_gcd(lcf, lcg, p) # polynomial in Z_p[y] + + evaltest = delta + + for i in range(k-1): + evaltest *= _gf_gcd(_LC(_swap(f, i)), _LC(_swap(g, i)), p) + + degdelta = delta.degree() + + N = min(degyf - degcontf, degyg - degcontg, + degbound[k-1] - contbound[k-1] + degdelta) + 1 + + if p < N: + return None + + n = 0 + d = 0 + evalpoints = [] + heval = [] + points = list(range(p)) + + while points: + a = random.sample(points, 1)[0] + points.remove(a) + + if not evaltest.evaluate(0, a) % p: + continue + + deltaa = delta.evaluate(0, a) % p + + fa = f.evaluate(k-1, a).trunc_ground(p) + ga = g.evaluate(k-1, a).trunc_ground(p) + + # polynomials in Z_p[x_0, ..., x_{k-2}] + ha = _modgcd_multivariate_p(fa, ga, p, degbound, contbound) + + if ha is None: + d += 1 + if d > n: + return None + continue + + if ha.is_ground: + h = conth.set_ring(ring).trunc_ground(p) + return h + + ha = ha.mul_ground(deltaa).trunc_ground(p) + + evalpoints.append(a) + heval.append(ha) + n += 1 + + if n == N: + h = _interpolate_multivariate(evalpoints, heval, ring, k-1, p) + + h = _primitive(h, p)[1] * conth.set_ring(ring) + degyh = h.degree(k-1) + + if degyh > degbound[k-1]: + return None + if degyh < degbound[k-1]: + degbound[k-1] = degyh + raise ModularGCDFailed + + return h + + return None + + +def modgcd_multivariate(f, g): + r""" + Compute the GCD of two polynomials in `\mathbb{Z}[x_0, \ldots, x_{k-1}]` + using a modular algorithm. + + The algorithm computes the GCD of two multivariate integer polynomials + `f` and `g` by calculating the GCD in + `\mathbb{Z}_p[x_0, \ldots, x_{k-1}]` for suitable primes `p` and then + reconstructing the coefficients with the Chinese Remainder Theorem. To + compute the multivariate GCD over `\mathbb{Z}_p` the recursive + subroutine :func:`_modgcd_multivariate_p` is used. To verify the result in + `\mathbb{Z}[x_0, \ldots, x_{k-1}]`, trial division is done, but only for + candidates which are very likely the desired GCD. + + Parameters + ========== + + f : PolyElement + multivariate integer polynomial + g : PolyElement + multivariate integer polynomial + + Returns + ======= + + h : PolyElement + GCD of the polynomials `f` and `g` + cff : PolyElement + cofactor of `f`, i.e. `\frac{f}{h}` + cfg : PolyElement + cofactor of `g`, i.e. `\frac{g}{h}` + + Examples + ======== + + >>> from sympy.polys.modulargcd import modgcd_multivariate + >>> from sympy.polys import ring, ZZ + + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2 - y**2 + >>> g = x**2 + 2*x*y + y**2 + + >>> h, cff, cfg = modgcd_multivariate(f, g) + >>> h, cff, cfg + (x + y, x - y, x + y) + + >>> cff * h == f + True + >>> cfg * h == g + True + + >>> R, x, y, z = ring("x, y, z", ZZ) + + >>> f = x*z**2 - y*z**2 + >>> g = x**2*z + z + + >>> h, cff, cfg = modgcd_multivariate(f, g) + >>> h, cff, cfg + (z, x*z - y*z, x**2 + 1) + + >>> cff * h == f + True + >>> cfg * h == g + True + + References + ========== + + 1. [Monagan00]_ + 2. [Brown71]_ + + See also + ======== + + _modgcd_multivariate_p + + """ + assert f.ring == g.ring and f.ring.domain.is_ZZ + + result = _trivial_gcd(f, g) + if result is not None: + return result + + ring = f.ring + k = ring.ngens + + # divide out integer content + cf, f = f.primitive() + cg, g = g.primitive() + ch = ring.domain.gcd(cf, cg) + + gamma = ring.domain.gcd(f.LC, g.LC) + + badprimes = ring.domain.one + for i in range(k): + badprimes *= ring.domain.gcd(_swap(f, i).LC, _swap(g, i).LC) + + degbound = [min(fdeg, gdeg) for fdeg, gdeg in zip(f.degrees(), g.degrees())] + contbound = list(degbound) + + m = 1 + p = 1 + + while True: + p = nextprime(p) + while badprimes % p == 0: + p = nextprime(p) + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + + try: + # monic GCD of fp, gp in Z_p[x_0, ..., x_{k-2}, y] + hp = _modgcd_multivariate_p(fp, gp, p, degbound, contbound) + except ModularGCDFailed: + m = 1 + continue + + if hp is None: + continue + + hp = hp.mul_ground(gamma).trunc_ground(p) + if m == 1: + m = p + hlastm = hp + continue + + hm = _chinese_remainder_reconstruction_multivariate(hp, hlastm, p, m) + m *= p + + if not hm == hlastm: + hlastm = hm + continue + + h = hm.primitive()[1] + fquo, frem = f.div(h) + gquo, grem = g.div(h) + if not frem and not grem: + if h.LC < 0: + ch = -ch + h = h.mul_ground(ch) + cff = fquo.mul_ground(cf // ch) + cfg = gquo.mul_ground(cg // ch) + return h, cff, cfg + + +def _gf_div(f, g, p): + r""" + Compute `\frac f g` modulo `p` for two univariate polynomials over + `\mathbb Z_p`. + """ + ring = f.ring + densequo, denserem = gf_div(f.to_dense(), g.to_dense(), p, ring.domain) + return ring.from_dense(densequo), ring.from_dense(denserem) + + +def _rational_function_reconstruction(c, p, m): + r""" + Reconstruct a rational function `\frac a b` in `\mathbb Z_p(t)` from + + .. math:: + + c = \frac a b \; \mathrm{mod} \, m, + + where `c` and `m` are polynomials in `\mathbb Z_p[t]` and `m` has + positive degree. + + The algorithm is based on the Euclidean Algorithm. In general, `m` is + not irreducible, so it is possible that `b` is not invertible modulo + `m`. In that case ``None`` is returned. + + Parameters + ========== + + c : PolyElement + univariate polynomial in `\mathbb Z[t]` + p : Integer + prime number + m : PolyElement + modulus, not necessarily irreducible + + Returns + ======= + + frac : FracElement + either `\frac a b` in `\mathbb Z(t)` or ``None`` + + References + ========== + + 1. [Hoeij04]_ + + """ + ring = c.ring + domain = ring.domain + M = m.degree() + N = M // 2 + D = M - N - 1 + + r0, s0 = m, ring.zero + r1, s1 = c, ring.one + + while r1.degree() > N: + quo = _gf_div(r0, r1, p)[0] + r0, r1 = r1, (r0 - quo*r1).trunc_ground(p) + s0, s1 = s1, (s0 - quo*s1).trunc_ground(p) + + a, b = r1, s1 + if b.degree() > D or _gf_gcd(b, m, p) != 1: + return None + + lc = b.LC + if lc != 1: + lcinv = domain.invert(lc, p) + a = a.mul_ground(lcinv).trunc_ground(p) + b = b.mul_ground(lcinv).trunc_ground(p) + + field = ring.to_field() + + return field(a) / field(b) + + +def _rational_reconstruction_func_coeffs(hm, p, m, ring, k): + r""" + Reconstruct every coefficient `c_h` of a polynomial `h` in + `\mathbb Z_p(t_k)[t_1, \ldots, t_{k-1}][x, z]` from the corresponding + coefficient `c_{h_m}` of a polynomial `h_m` in + `\mathbb Z_p[t_1, \ldots, t_k][x, z] \cong \mathbb Z_p[t_k][t_1, \ldots, t_{k-1}][x, z]` + such that + + .. math:: + + c_{h_m} = c_h \; \mathrm{mod} \, m, + + where `m \in \mathbb Z_p[t]`. + + The reconstruction is based on the Euclidean Algorithm. In general, `m` + is not irreducible, so it is possible that this fails for some + coefficient. In that case ``None`` is returned. + + Parameters + ========== + + hm : PolyElement + polynomial in `\mathbb Z[t_1, \ldots, t_k][x, z]` + p : Integer + prime number, modulus of `\mathbb Z_p` + m : PolyElement + modulus, polynomial in `\mathbb Z[t]`, not necessarily irreducible + ring : PolyRing + `\mathbb Z(t_k)[t_1, \ldots, t_{k-1}][x, z]`, `h` will be an + element of this ring + k : Integer + index of the parameter `t_k` which will be reconstructed + + Returns + ======= + + h : PolyElement + reconstructed polynomial in + `\mathbb Z(t_k)[t_1, \ldots, t_{k-1}][x, z]` or ``None`` + + See also + ======== + + _rational_function_reconstruction + + """ + h = ring.zero + + for monom, coeff in hm.iterterms(): + if k == 0: + coeffh = _rational_function_reconstruction(coeff, p, m) + + if not coeffh: + return None + + else: + coeffh = ring.domain.zero + for mon, c in coeff.drop_to_ground(k).iterterms(): + ch = _rational_function_reconstruction(c, p, m) + + if not ch: + return None + + coeffh[mon] = ch + + h[monom] = coeffh + + return h + + +def _gf_gcdex(f, g, p): + r""" + Extended Euclidean Algorithm for two univariate polynomials over + `\mathbb Z_p`. + + Returns polynomials `s, t` and `h`, such that `h` is the GCD of `f` and + `g` and `sf + tg = h \; \mathrm{mod} \, p`. + + """ + ring = f.ring + s, t, h = gf_gcdex(f.to_dense(), g.to_dense(), p, ring.domain) + return ring.from_dense(s), ring.from_dense(t), ring.from_dense(h) + + +def _trunc(f, minpoly, p): + r""" + Compute the reduced representation of a polynomial `f` in + `\mathbb Z_p[z] / (\check m_{\alpha}(z))[x]` + + Parameters + ========== + + f : PolyElement + polynomial in `\mathbb Z[x, z]` + minpoly : PolyElement + polynomial `\check m_{\alpha} \in \mathbb Z[z]`, not necessarily + irreducible + p : Integer + prime number, modulus of `\mathbb Z_p` + + Returns + ======= + + ftrunc : PolyElement + polynomial in `\mathbb Z[x, z]`, reduced modulo + `\check m_{\alpha}(z)` and `p` + + """ + ring = f.ring + minpoly = minpoly.set_ring(ring) + p_ = ring.ground_new(p) + + return f.trunc_ground(p).rem([minpoly, p_]).trunc_ground(p) + + +def _euclidean_algorithm(f, g, minpoly, p): + r""" + Compute the monic GCD of two univariate polynomials in + `\mathbb{Z}_p[z]/(\check m_{\alpha}(z))[x]` with the Euclidean + Algorithm. + + In general, `\check m_{\alpha}(z)` is not irreducible, so it is possible + that some leading coefficient is not invertible modulo + `\check m_{\alpha}(z)`. In that case ``None`` is returned. + + Parameters + ========== + + f, g : PolyElement + polynomials in `\mathbb Z[x, z]` + minpoly : PolyElement + polynomial in `\mathbb Z[z]`, not necessarily irreducible + p : Integer + prime number, modulus of `\mathbb Z_p` + + Returns + ======= + + h : PolyElement + GCD of `f` and `g` in `\mathbb Z[z, x]` or ``None``, coefficients + are in `\left[ -\frac{p-1} 2, \frac{p-1} 2 \right]` + + """ + ring = f.ring + + f = _trunc(f, minpoly, p) + g = _trunc(g, minpoly, p) + + while g: + rem = f + deg = g.degree(0) # degree in x + lcinv, _, gcd = _gf_gcdex(ring.dmp_LC(g), minpoly, p) + + if not gcd == 1: + return None + + while True: + degrem = rem.degree(0) # degree in x + if degrem < deg: + break + quo = (lcinv * ring.dmp_LC(rem)).set_ring(ring) + rem = _trunc(rem - g.mul_monom((degrem - deg, 0))*quo, minpoly, p) + + f = g + g = rem + + lcfinv = _gf_gcdex(ring.dmp_LC(f), minpoly, p)[0].set_ring(ring) + + return _trunc(f * lcfinv, minpoly, p) + + +def _trial_division(f, h, minpoly, p=None): + r""" + Check if `h` divides `f` in + `\mathbb K[t_1, \ldots, t_k][z]/(m_{\alpha}(z))`, where `\mathbb K` is + either `\mathbb Q` or `\mathbb Z_p`. + + This algorithm is based on pseudo division and does not use any + fractions. By default `\mathbb K` is `\mathbb Q`, if a prime number `p` + is given, `\mathbb Z_p` is chosen instead. + + Parameters + ========== + + f, h : PolyElement + polynomials in `\mathbb Z[t_1, \ldots, t_k][x, z]` + minpoly : PolyElement + polynomial `m_{\alpha}(z)` in `\mathbb Z[t_1, \ldots, t_k][z]` + p : Integer or None + if `p` is given, `\mathbb K` is set to `\mathbb Z_p` instead of + `\mathbb Q`, default is ``None`` + + Returns + ======= + + rem : PolyElement + remainder of `\frac f h` + + References + ========== + + .. [1] [Hoeij02]_ + + """ + ring = f.ring + + zxring = ring.clone(symbols=(ring.symbols[1], ring.symbols[0])) + + minpoly = minpoly.set_ring(ring) + + rem = f + + degrem = rem.degree() + degh = h.degree() + degm = minpoly.degree(1) + + lch = _LC(h).set_ring(ring) + lcm = minpoly.LC + + while rem and degrem >= degh: + # polynomial in Z[t_1, ..., t_k][z] + lcrem = _LC(rem).set_ring(ring) + rem = rem*lch - h.mul_monom((degrem - degh, 0))*lcrem + if p: + rem = rem.trunc_ground(p) + degrem = rem.degree(1) + + while rem and degrem >= degm: + # polynomial in Z[t_1, ..., t_k][x] + lcrem = _LC(rem.set_ring(zxring)).set_ring(ring) + rem = rem.mul_ground(lcm) - minpoly.mul_monom((0, degrem - degm))*lcrem + if p: + rem = rem.trunc_ground(p) + degrem = rem.degree(1) + + degrem = rem.degree() + + return rem + + +def _evaluate_ground(f, i, a): + r""" + Evaluate a polynomial `f` at `a` in the `i`-th variable of the ground + domain. + """ + ring = f.ring.clone(domain=f.ring.domain.ring.drop(i)) + fa = ring.zero + + for monom, coeff in f.iterterms(): + fa[monom] = coeff.evaluate(i, a) + + return fa + + +def _func_field_modgcd_p(f, g, minpoly, p): + r""" + Compute the GCD of two polynomials `f` and `g` in + `\mathbb Z_p(t_1, \ldots, t_k)[z]/(\check m_\alpha(z))[x]`. + + The algorithm reduces the problem step by step by evaluating the + polynomials `f` and `g` at `t_k = a` for suitable `a \in \mathbb Z_p` + and then calls itself recursively to compute the GCD in + `\mathbb Z_p(t_1, \ldots, t_{k-1})[z]/(\check m_\alpha(z))[x]`. If these + recursive calls are successful, the GCD over `k` variables is + interpolated, otherwise the algorithm returns ``None``. After + interpolation, Rational Function Reconstruction is used to obtain the + correct coefficients. If this fails, a new evaluation point has to be + chosen, otherwise the desired polynomial is obtained by clearing + denominators. The result is verified with a fraction free trial + division. + + Parameters + ========== + + f, g : PolyElement + polynomials in `\mathbb Z[t_1, \ldots, t_k][x, z]` + minpoly : PolyElement + polynomial in `\mathbb Z[t_1, \ldots, t_k][z]`, not necessarily + irreducible + p : Integer + prime number, modulus of `\mathbb Z_p` + + Returns + ======= + + h : PolyElement + primitive associate in `\mathbb Z[t_1, \ldots, t_k][x, z]` of the + GCD of the polynomials `f` and `g` or ``None``, coefficients are + in `\left[ -\frac{p-1} 2, \frac{p-1} 2 \right]` + + References + ========== + + 1. [Hoeij04]_ + + """ + ring = f.ring + domain = ring.domain # Z[t_1, ..., t_k] + + if isinstance(domain, PolynomialRing): + k = domain.ngens + else: + return _euclidean_algorithm(f, g, minpoly, p) + + if k == 1: + qdomain = domain.ring.to_field() + else: + qdomain = domain.ring.drop_to_ground(k - 1) + qdomain = qdomain.clone(domain=qdomain.domain.ring.to_field()) + + qring = ring.clone(domain=qdomain) # = Z(t_k)[t_1, ..., t_{k-1}][x, z] + + n = 1 + d = 1 + + # polynomial in Z_p[t_1, ..., t_k][z] + gamma = ring.dmp_LC(f) * ring.dmp_LC(g) + # polynomial in Z_p[t_1, ..., t_k] + delta = minpoly.LC + + evalpoints = [] + heval = [] + LMlist = [] + points = list(range(p)) + + while points: + a = random.sample(points, 1)[0] + points.remove(a) + + if k == 1: + test = delta.evaluate(k-1, a) % p == 0 + else: + test = delta.evaluate(k-1, a).trunc_ground(p) == 0 + + if test: + continue + + gammaa = _evaluate_ground(gamma, k-1, a) + minpolya = _evaluate_ground(minpoly, k-1, a) + + if gammaa.rem([minpolya, gammaa.ring(p)]) == 0: + continue + + fa = _evaluate_ground(f, k-1, a) + ga = _evaluate_ground(g, k-1, a) + + # polynomial in Z_p[x, t_1, ..., t_{k-1}, z]/(minpoly) + ha = _func_field_modgcd_p(fa, ga, minpolya, p) + + if ha is None: + d += 1 + if d > n: + return None + continue + + if ha == 1: + return ha + + LM = [ha.degree()] + [0]*(k-1) + if k > 1: + for monom, coeff in ha.iterterms(): + if monom[0] == LM[0] and coeff.LM > tuple(LM[1:]): + LM[1:] = coeff.LM + + evalpoints_a = [a] + heval_a = [ha] + if k == 1: + m = qring.domain.get_ring().one + else: + m = qring.domain.domain.get_ring().one + + t = m.ring.gens[0] + + for b, hb, LMhb in zip(evalpoints, heval, LMlist): + if LMhb == LM: + evalpoints_a.append(b) + heval_a.append(hb) + m *= (t - b) + + m = m.trunc_ground(p) + evalpoints.append(a) + heval.append(ha) + LMlist.append(LM) + n += 1 + + # polynomial in Z_p[t_1, ..., t_k][x, z] + h = _interpolate_multivariate(evalpoints_a, heval_a, ring, k-1, p, ground=True) + + # polynomial in Z_p(t_k)[t_1, ..., t_{k-1}][x, z] + h = _rational_reconstruction_func_coeffs(h, p, m, qring, k-1) + + if h is None: + continue + + if k == 1: + dom = qring.domain.field + den = dom.ring.one + + for coeff in h.itercoeffs(): + den = dom.ring.from_dense(gf_lcm(den.to_dense(), coeff.denom.to_dense(), + p, dom.domain)) + + else: + dom = qring.domain.domain.field + den = dom.ring.one + + for coeff in h.itercoeffs(): + for c in coeff.itercoeffs(): + den = dom.ring.from_dense(gf_lcm(den.to_dense(), c.denom.to_dense(), + p, dom.domain)) + + den = qring.domain_new(den.trunc_ground(p)) + h = ring(h.mul_ground(den).as_expr()).trunc_ground(p) + + if not _trial_division(f, h, minpoly, p) and not _trial_division(g, h, minpoly, p): + return h + + return None + + +def _integer_rational_reconstruction(c, m, domain): + r""" + Reconstruct a rational number `\frac a b` from + + .. math:: + + c = \frac a b \; \mathrm{mod} \, m, + + where `c` and `m` are integers. + + The algorithm is based on the Euclidean Algorithm. In general, `m` is + not a prime number, so it is possible that `b` is not invertible modulo + `m`. In that case ``None`` is returned. + + Parameters + ========== + + c : Integer + `c = \frac a b \; \mathrm{mod} \, m` + m : Integer + modulus, not necessarily prime + domain : IntegerRing + `a, b, c` are elements of ``domain`` + + Returns + ======= + + frac : Rational + either `\frac a b` in `\mathbb Q` or ``None`` + + References + ========== + + 1. [Wang81]_ + + """ + if c < 0: + c += m + + r0, s0 = m, domain.zero + r1, s1 = c, domain.one + + bound = sqrt(m / 2) # still correct if replaced by ZZ.sqrt(m // 2) ? + + while int(r1) >= bound: + quo = r0 // r1 + r0, r1 = r1, r0 - quo*r1 + s0, s1 = s1, s0 - quo*s1 + + if abs(int(s1)) >= bound: + return None + + if s1 < 0: + a, b = -r1, -s1 + elif s1 > 0: + a, b = r1, s1 + else: + return None + + field = domain.get_field() + + return field(a) / field(b) + + +def _rational_reconstruction_int_coeffs(hm, m, ring): + r""" + Reconstruct every rational coefficient `c_h` of a polynomial `h` in + `\mathbb Q[t_1, \ldots, t_k][x, z]` from the corresponding integer + coefficient `c_{h_m}` of a polynomial `h_m` in + `\mathbb Z[t_1, \ldots, t_k][x, z]` such that + + .. math:: + + c_{h_m} = c_h \; \mathrm{mod} \, m, + + where `m \in \mathbb Z`. + + The reconstruction is based on the Euclidean Algorithm. In general, + `m` is not a prime number, so it is possible that this fails for some + coefficient. In that case ``None`` is returned. + + Parameters + ========== + + hm : PolyElement + polynomial in `\mathbb Z[t_1, \ldots, t_k][x, z]` + m : Integer + modulus, not necessarily prime + ring : PolyRing + `\mathbb Q[t_1, \ldots, t_k][x, z]`, `h` will be an element of this + ring + + Returns + ======= + + h : PolyElement + reconstructed polynomial in `\mathbb Q[t_1, \ldots, t_k][x, z]` or + ``None`` + + See also + ======== + + _integer_rational_reconstruction + + """ + h = ring.zero + + if isinstance(ring.domain, PolynomialRing): + reconstruction = _rational_reconstruction_int_coeffs + domain = ring.domain.ring + else: + reconstruction = _integer_rational_reconstruction + domain = hm.ring.domain + + for monom, coeff in hm.iterterms(): + coeffh = reconstruction(coeff, m, domain) + + if not coeffh: + return None + + h[monom] = coeffh + + return h + + +def _func_field_modgcd_m(f, g, minpoly): + r""" + Compute the GCD of two polynomials in + `\mathbb Q(t_1, \ldots, t_k)[z]/(m_{\alpha}(z))[x]` using a modular + algorithm. + + The algorithm computes the GCD of two polynomials `f` and `g` by + calculating the GCD in + `\mathbb Z_p(t_1, \ldots, t_k)[z] / (\check m_{\alpha}(z))[x]` for + suitable primes `p` and the primitive associate `\check m_{\alpha}(z)` + of `m_{\alpha}(z)`. Then the coefficients are reconstructed with the + Chinese Remainder Theorem and Rational Reconstruction. To compute the + GCD over `\mathbb Z_p(t_1, \ldots, t_k)[z] / (\check m_{\alpha})[x]`, + the recursive subroutine ``_func_field_modgcd_p`` is used. To verify the + result in `\mathbb Q(t_1, \ldots, t_k)[z] / (m_{\alpha}(z))[x]`, a + fraction free trial division is used. + + Parameters + ========== + + f, g : PolyElement + polynomials in `\mathbb Z[t_1, \ldots, t_k][x, z]` + minpoly : PolyElement + irreducible polynomial in `\mathbb Z[t_1, \ldots, t_k][z]` + + Returns + ======= + + h : PolyElement + the primitive associate in `\mathbb Z[t_1, \ldots, t_k][x, z]` of + the GCD of `f` and `g` + + Examples + ======== + + >>> from sympy.polys.modulargcd import _func_field_modgcd_m + >>> from sympy.polys import ring, ZZ + + >>> R, x, z = ring('x, z', ZZ) + >>> minpoly = (z**2 - 2).drop(0) + + >>> f = x**2 + 2*x*z + 2 + >>> g = x + z + >>> _func_field_modgcd_m(f, g, minpoly) + x + z + + >>> D, t = ring('t', ZZ) + >>> R, x, z = ring('x, z', D) + >>> minpoly = (z**2-3).drop(0) + + >>> f = x**2 + (t + 1)*x*z + 3*t + >>> g = x*z + 3*t + >>> _func_field_modgcd_m(f, g, minpoly) + x + t*z + + References + ========== + + 1. [Hoeij04]_ + + See also + ======== + + _func_field_modgcd_p + + """ + ring = f.ring + domain = ring.domain + + if isinstance(domain, PolynomialRing): + k = domain.ngens + QQdomain = domain.ring.clone(domain=domain.domain.get_field()) + QQring = ring.clone(domain=QQdomain) + else: + k = 0 + QQring = ring.clone(domain=ring.domain.get_field()) + + cf, f = f.primitive() + cg, g = g.primitive() + + # polynomial in Z[t_1, ..., t_k][z] + gamma = ring.dmp_LC(f) * ring.dmp_LC(g) + # polynomial in Z[t_1, ..., t_k] + delta = minpoly.LC + + p = 1 + primes = [] + hplist = [] + LMlist = [] + + while True: + p = nextprime(p) + + if gamma.trunc_ground(p) == 0: + continue + + if k == 0: + test = (delta % p == 0) + else: + test = (delta.trunc_ground(p) == 0) + + if test: + continue + + fp = f.trunc_ground(p) + gp = g.trunc_ground(p) + minpolyp = minpoly.trunc_ground(p) + + hp = _func_field_modgcd_p(fp, gp, minpolyp, p) + + if hp is None: + continue + + if hp == 1: + return ring.one + + LM = [hp.degree()] + [0]*k + if k > 0: + for monom, coeff in hp.iterterms(): + if monom[0] == LM[0] and coeff.LM > tuple(LM[1:]): + LM[1:] = coeff.LM + + hm = hp + m = p + + for q, hq, LMhq in zip(primes, hplist, LMlist): + if LMhq == LM: + hm = _chinese_remainder_reconstruction_multivariate(hq, hm, q, m) + m *= q + + primes.append(p) + hplist.append(hp) + LMlist.append(LM) + + hm = _rational_reconstruction_int_coeffs(hm, m, QQring) + + if hm is None: + continue + + if k == 0: + h = hm.clear_denoms()[1] + else: + den = domain.domain.one + for coeff in hm.itercoeffs(): + den = domain.domain.lcm(den, coeff.clear_denoms()[0]) + h = hm.mul_ground(den) + + # convert back to Z[t_1, ..., t_k][x, z] from Q[t_1, ..., t_k][x, z] + h = h.set_ring(ring) + h = h.primitive()[1] + + if not (_trial_division(f.mul_ground(cf), h, minpoly) or + _trial_division(g.mul_ground(cg), h, minpoly)): + return h + + +def _to_ZZ_poly(f, ring): + r""" + Compute an associate of a polynomial + `f \in \mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` in + `\mathbb Z[x_1, \ldots, x_{n-1}][z] / (\check m_{\alpha}(z))[x_0]`, + where `\check m_{\alpha}(z) \in \mathbb Z[z]` is the primitive associate + of the minimal polynomial `m_{\alpha}(z)` of `\alpha` over + `\mathbb Q`. + + Parameters + ========== + + f : PolyElement + polynomial in `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` + ring : PolyRing + `\mathbb Z[x_1, \ldots, x_{n-1}][x_0, z]` + + Returns + ======= + + f_ : PolyElement + associate of `f` in + `\mathbb Z[x_1, \ldots, x_{n-1}][x_0, z]` + + """ + f_ = ring.zero + + if isinstance(ring.domain, PolynomialRing): + domain = ring.domain.domain + else: + domain = ring.domain + + den = domain.one + + for coeff in f.itercoeffs(): + for c in coeff.to_list(): + if c: + den = domain.lcm(den, c.denominator) + + for monom, coeff in f.iterterms(): + coeff = coeff.to_list() + m = ring.domain.one + if isinstance(ring.domain, PolynomialRing): + m = m.mul_monom(monom[1:]) + n = len(coeff) + + for i in range(n): + if coeff[i]: + c = domain.convert(coeff[i] * den) * m + + if (monom[0], n-i-1) not in f_: + f_[(monom[0], n-i-1)] = c + else: + f_[(monom[0], n-i-1)] += c + + return f_ + + +def _to_ANP_poly(f, ring): + r""" + Convert a polynomial + `f \in \mathbb Z[x_1, \ldots, x_{n-1}][z]/(\check m_{\alpha}(z))[x_0]` + to a polynomial in `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]`, + where `\check m_{\alpha}(z) \in \mathbb Z[z]` is the primitive associate + of the minimal polynomial `m_{\alpha}(z)` of `\alpha` over + `\mathbb Q`. + + Parameters + ========== + + f : PolyElement + polynomial in `\mathbb Z[x_1, \ldots, x_{n-1}][x_0, z]` + ring : PolyRing + `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` + + Returns + ======= + + f_ : PolyElement + polynomial in `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` + + """ + domain = ring.domain + f_ = ring.zero + + if isinstance(f.ring.domain, PolynomialRing): + for monom, coeff in f.iterterms(): + for mon, coef in coeff.iterterms(): + m = (monom[0],) + mon + c = domain([domain.domain(coef)] + [0]*monom[1]) + + if m not in f_: + f_[m] = c + else: + f_[m] += c + + else: + for monom, coeff in f.iterterms(): + m = (monom[0],) + c = domain([domain.domain(coeff)] + [0]*monom[1]) + + if m not in f_: + f_[m] = c + else: + f_[m] += c + + return f_ + + +def _minpoly_from_dense(minpoly, ring): + r""" + Change representation of the minimal polynomial from ``DMP`` to + ``PolyElement`` for a given ring. + """ + minpoly_ = ring.zero + + for monom, coeff in minpoly.terms(): + minpoly_[monom] = ring.domain(coeff) + + return minpoly_ + + +def _primitive_in_x0(f): + r""" + Compute the content in `x_0` and the primitive part of a polynomial `f` + in + `\mathbb Q(\alpha)[x_0, x_1, \ldots, x_{n-1}] \cong \mathbb Q(\alpha)[x_1, \ldots, x_{n-1}][x_0]`. + """ + fring = f.ring + ring = fring.drop_to_ground(*range(1, fring.ngens)) + dom = ring.domain.ring + f_ = ring(f.as_expr()) + cont = dom.zero + + for coeff in f_.itercoeffs(): + cont = func_field_modgcd(cont, coeff)[0] + if cont == dom.one: + return cont, f + + return cont, f.quo(cont.set_ring(fring)) + + +# TODO: add support for algebraic function fields +def func_field_modgcd(f, g): + r""" + Compute the GCD of two polynomials `f` and `g` in + `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` using a modular algorithm. + + The algorithm first computes the primitive associate + `\check m_{\alpha}(z)` of the minimal polynomial `m_{\alpha}` in + `\mathbb{Z}[z]` and the primitive associates of `f` and `g` in + `\mathbb{Z}[x_1, \ldots, x_{n-1}][z]/(\check m_{\alpha})[x_0]`. Then it + computes the GCD in + `\mathbb Q(x_1, \ldots, x_{n-1})[z]/(m_{\alpha}(z))[x_0]`. + This is done by calculating the GCD in + `\mathbb{Z}_p(x_1, \ldots, x_{n-1})[z]/(\check m_{\alpha}(z))[x_0]` for + suitable primes `p` and then reconstructing the coefficients with the + Chinese Remainder Theorem and Rational Reconstruction. The GCD over + `\mathbb{Z}_p(x_1, \ldots, x_{n-1})[z]/(\check m_{\alpha}(z))[x_0]` is + computed with a recursive subroutine, which evaluates the polynomials at + `x_{n-1} = a` for suitable evaluation points `a \in \mathbb Z_p` and + then calls itself recursively until the ground domain does no longer + contain any parameters. For + `\mathbb{Z}_p[z]/(\check m_{\alpha}(z))[x_0]` the Euclidean Algorithm is + used. The results of those recursive calls are then interpolated and + Rational Function Reconstruction is used to obtain the correct + coefficients. The results, both in + `\mathbb Q(x_1, \ldots, x_{n-1})[z]/(m_{\alpha}(z))[x_0]` and + `\mathbb{Z}_p(x_1, \ldots, x_{n-1})[z]/(\check m_{\alpha}(z))[x_0]`, are + verified by a fraction free trial division. + + Apart from the above GCD computation some GCDs in + `\mathbb Q(\alpha)[x_1, \ldots, x_{n-1}]` have to be calculated, + because treating the polynomials as univariate ones can result in + a spurious content of the GCD. For this ``func_field_modgcd`` is + called recursively. + + Parameters + ========== + + f, g : PolyElement + polynomials in `\mathbb Q(\alpha)[x_0, \ldots, x_{n-1}]` + + Returns + ======= + + h : PolyElement + monic GCD of the polynomials `f` and `g` + cff : PolyElement + cofactor of `f`, i.e. `\frac f h` + cfg : PolyElement + cofactor of `g`, i.e. `\frac g h` + + Examples + ======== + + >>> from sympy.polys.modulargcd import func_field_modgcd + >>> from sympy.polys import AlgebraicField, QQ, ring + >>> from sympy import sqrt + + >>> A = AlgebraicField(QQ, sqrt(2)) + >>> R, x = ring('x', A) + + >>> f = x**2 - 2 + >>> g = x + sqrt(2) + + >>> h, cff, cfg = func_field_modgcd(f, g) + + >>> h == x + sqrt(2) + True + >>> cff * h == f + True + >>> cfg * h == g + True + + >>> R, x, y = ring('x, y', A) + + >>> f = x**2 + 2*sqrt(2)*x*y + 2*y**2 + >>> g = x + sqrt(2)*y + + >>> h, cff, cfg = func_field_modgcd(f, g) + + >>> h == x + sqrt(2)*y + True + >>> cff * h == f + True + >>> cfg * h == g + True + + >>> f = x + sqrt(2)*y + >>> g = x + y + + >>> h, cff, cfg = func_field_modgcd(f, g) + + >>> h == R.one + True + >>> cff * h == f + True + >>> cfg * h == g + True + + References + ========== + + 1. [Hoeij04]_ + + """ + ring = f.ring + domain = ring.domain + n = ring.ngens + + assert ring == g.ring and domain.is_Algebraic + + result = _trivial_gcd(f, g) + if result is not None: + return result + + z = Dummy('z') + + ZZring = ring.clone(symbols=ring.symbols + (z,), domain=domain.domain.get_ring()) + + if n == 1: + f_ = _to_ZZ_poly(f, ZZring) + g_ = _to_ZZ_poly(g, ZZring) + minpoly = ZZring.drop(0).from_dense(domain.mod.to_list()) + + h = _func_field_modgcd_m(f_, g_, minpoly) + h = _to_ANP_poly(h, ring) + + else: + # contx0f in Q(a)[x_1, ..., x_{n-1}], f in Q(a)[x_0, ..., x_{n-1}] + contx0f, f = _primitive_in_x0(f) + contx0g, g = _primitive_in_x0(g) + contx0h = func_field_modgcd(contx0f, contx0g)[0] + + ZZring_ = ZZring.drop_to_ground(*range(1, n)) + + f_ = _to_ZZ_poly(f, ZZring_) + g_ = _to_ZZ_poly(g, ZZring_) + minpoly = _minpoly_from_dense(domain.mod, ZZring_.drop(0)) + + h = _func_field_modgcd_m(f_, g_, minpoly) + h = _to_ANP_poly(h, ring) + + contx0h_, h = _primitive_in_x0(h) + h *= contx0h.set_ring(ring) + f *= contx0f.set_ring(ring) + g *= contx0g.set_ring(ring) + + h = h.quo_ground(h.LC) + + return h, f.quo(h), g.quo(h) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/monomials.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/monomials.py new file mode 100644 index 0000000000000000000000000000000000000000..43a17223861f656b8a4a51fb4c0c934635ed4623 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/monomials.py @@ -0,0 +1,628 @@ +"""Tools and arithmetics for monomials of distributed polynomials. """ + + +from itertools import combinations_with_replacement, product +from textwrap import dedent + +from sympy.core.cache import cacheit +from sympy.core import Mul, S, Tuple, sympify +from sympy.polys.polyerrors import ExactQuotientFailed +from sympy.polys.polyutils import PicklableWithSlots, dict_from_expr +from sympy.utilities import public +from sympy.utilities.iterables import is_sequence, iterable + +@public +def itermonomials(variables, max_degrees, min_degrees=None): + r""" + ``max_degrees`` and ``min_degrees`` are either both integers or both lists. + Unless otherwise specified, ``min_degrees`` is either ``0`` or + ``[0, ..., 0]``. + + A generator of all monomials ``monom`` is returned, such that + either + ``min_degree <= total_degree(monom) <= max_degree``, + or + ``min_degrees[i] <= degree_list(monom)[i] <= max_degrees[i]``, + for all ``i``. + + Case I. ``max_degrees`` and ``min_degrees`` are both integers + ============================================================= + + Given a set of variables $V$ and a min_degree $N$ and a max_degree $M$ + generate a set of monomials of degree less than or equal to $N$ and greater + than or equal to $M$. The total number of monomials in commutative + variables is huge and is given by the following formula if $M = 0$: + + .. math:: + \frac{(\#V + N)!}{\#V! N!} + + For example if we would like to generate a dense polynomial of + a total degree $N = 50$ and $M = 0$, which is the worst case, in 5 + variables, assuming that exponents and all of coefficients are 32-bit long + and stored in an array we would need almost 80 GiB of memory! Fortunately + most polynomials, that we will encounter, are sparse. + + Consider monomials in commutative variables $x$ and $y$ + and non-commutative variables $a$ and $b$:: + + >>> from sympy import symbols + >>> from sympy.polys.monomials import itermonomials + >>> from sympy.polys.orderings import monomial_key + >>> from sympy.abc import x, y + + >>> sorted(itermonomials([x, y], 2), key=monomial_key('grlex', [y, x])) + [1, x, y, x**2, x*y, y**2] + + >>> sorted(itermonomials([x, y], 3), key=monomial_key('grlex', [y, x])) + [1, x, y, x**2, x*y, y**2, x**3, x**2*y, x*y**2, y**3] + + >>> a, b = symbols('a, b', commutative=False) + >>> set(itermonomials([a, b, x], 2)) + {1, a, a**2, b, b**2, x, x**2, a*b, b*a, x*a, x*b} + + >>> sorted(itermonomials([x, y], 2, 1), key=monomial_key('grlex', [y, x])) + [x, y, x**2, x*y, y**2] + + Case II. ``max_degrees`` and ``min_degrees`` are both lists + =========================================================== + + If ``max_degrees = [d_1, ..., d_n]`` and + ``min_degrees = [e_1, ..., e_n]``, the number of monomials generated + is: + + .. math:: + (d_1 - e_1 + 1) (d_2 - e_2 + 1) \cdots (d_n - e_n + 1) + + Let us generate all monomials ``monom`` in variables $x$ and $y$ + such that ``[1, 2][i] <= degree_list(monom)[i] <= [2, 4][i]``, + ``i = 0, 1`` :: + + >>> from sympy import symbols + >>> from sympy.polys.monomials import itermonomials + >>> from sympy.polys.orderings import monomial_key + >>> from sympy.abc import x, y + + >>> sorted(itermonomials([x, y], [2, 4], [1, 2]), reverse=True, key=monomial_key('lex', [x, y])) + [x**2*y**4, x**2*y**3, x**2*y**2, x*y**4, x*y**3, x*y**2] + """ + if is_sequence(max_degrees): + n = len(variables) + if len(max_degrees) != n: + raise ValueError('Argument sizes do not match') + if min_degrees is None: + min_degrees = [0]*n + elif not is_sequence(min_degrees): + raise ValueError('min_degrees is not a list') + else: + if len(min_degrees) != n: + raise ValueError('Argument sizes do not match') + if any(i < 0 for i in min_degrees): + raise ValueError("min_degrees cannot contain negative numbers") + if any(min_degrees[i] > max_degrees[i] for i in range(n)): + raise ValueError('min_degrees[i] must be <= max_degrees[i] for all i') + power_lists = [] + for var, min_d, max_d in zip(variables, min_degrees, max_degrees): + power_lists.append([var**i for i in range(min_d, max_d + 1)]) + for powers in product(*power_lists): + yield Mul(*powers) + else: + max_degree = max_degrees + if max_degree < 0: + raise ValueError("max_degrees cannot be negative") + if min_degrees is None: + min_degree = 0 + else: + if min_degrees < 0: + raise ValueError("min_degrees cannot be negative") + min_degree = min_degrees + if min_degree > max_degree: + return + if not variables or max_degree == 0: + yield S.One + return + # Force to list in case of passed tuple or other incompatible collection + variables = list(variables) + [S.One] + if all(variable.is_commutative for variable in variables): + it = combinations_with_replacement(variables, max_degree) + else: + it = product(variables, repeat=max_degree) + monomials_set = set() + d = max_degree - min_degree + for item in it: + count = 0 + for variable in item: + if variable == 1: + count += 1 + if d < count: + break + else: + monomials_set.add(Mul(*item)) + yield from monomials_set + +def monomial_count(V, N): + r""" + Computes the number of monomials. + + The number of monomials is given by the following formula: + + .. math:: + + \frac{(\#V + N)!}{\#V! N!} + + where `N` is a total degree and `V` is a set of variables. + + Examples + ======== + + >>> from sympy.polys.monomials import itermonomials, monomial_count + >>> from sympy.polys.orderings import monomial_key + >>> from sympy.abc import x, y + + >>> monomial_count(2, 2) + 6 + + >>> M = list(itermonomials([x, y], 2)) + + >>> sorted(M, key=monomial_key('grlex', [y, x])) + [1, x, y, x**2, x*y, y**2] + >>> len(M) + 6 + + """ + from sympy.functions.combinatorial.factorials import factorial + return factorial(V + N) / factorial(V) / factorial(N) + +def monomial_mul(A, B): + """ + Multiplication of tuples representing monomials. + + Examples + ======== + + Lets multiply `x**3*y**4*z` with `x*y**2`:: + + >>> from sympy.polys.monomials import monomial_mul + + >>> monomial_mul((3, 4, 1), (1, 2, 0)) + (4, 6, 1) + + which gives `x**4*y**5*z`. + + """ + return tuple([ a + b for a, b in zip(A, B) ]) + +def monomial_div(A, B): + """ + Division of tuples representing monomials. + + Examples + ======== + + Lets divide `x**3*y**4*z` by `x*y**2`:: + + >>> from sympy.polys.monomials import monomial_div + + >>> monomial_div((3, 4, 1), (1, 2, 0)) + (2, 2, 1) + + which gives `x**2*y**2*z`. However:: + + >>> monomial_div((3, 4, 1), (1, 2, 2)) is None + True + + `x*y**2*z**2` does not divide `x**3*y**4*z`. + + """ + C = monomial_ldiv(A, B) + + if all(c >= 0 for c in C): + return tuple(C) + else: + return None + +def monomial_ldiv(A, B): + """ + Division of tuples representing monomials. + + Examples + ======== + + Lets divide `x**3*y**4*z` by `x*y**2`:: + + >>> from sympy.polys.monomials import monomial_ldiv + + >>> monomial_ldiv((3, 4, 1), (1, 2, 0)) + (2, 2, 1) + + which gives `x**2*y**2*z`. + + >>> monomial_ldiv((3, 4, 1), (1, 2, 2)) + (2, 2, -1) + + which gives `x**2*y**2*z**-1`. + + """ + return tuple([ a - b for a, b in zip(A, B) ]) + +def monomial_pow(A, n): + """Return the n-th pow of the monomial. """ + return tuple([ a*n for a in A ]) + +def monomial_gcd(A, B): + """ + Greatest common divisor of tuples representing monomials. + + Examples + ======== + + Lets compute GCD of `x*y**4*z` and `x**3*y**2`:: + + >>> from sympy.polys.monomials import monomial_gcd + + >>> monomial_gcd((1, 4, 1), (3, 2, 0)) + (1, 2, 0) + + which gives `x*y**2`. + + """ + return tuple([ min(a, b) for a, b in zip(A, B) ]) + +def monomial_lcm(A, B): + """ + Least common multiple of tuples representing monomials. + + Examples + ======== + + Lets compute LCM of `x*y**4*z` and `x**3*y**2`:: + + >>> from sympy.polys.monomials import monomial_lcm + + >>> monomial_lcm((1, 4, 1), (3, 2, 0)) + (3, 4, 1) + + which gives `x**3*y**4*z`. + + """ + return tuple([ max(a, b) for a, b in zip(A, B) ]) + +def monomial_divides(A, B): + """ + Does there exist a monomial X such that XA == B? + + Examples + ======== + + >>> from sympy.polys.monomials import monomial_divides + >>> monomial_divides((1, 2), (3, 4)) + True + >>> monomial_divides((1, 2), (0, 2)) + False + """ + return all(a <= b for a, b in zip(A, B)) + +def monomial_max(*monoms): + """ + Returns maximal degree for each variable in a set of monomials. + + Examples + ======== + + Consider monomials `x**3*y**4*z**5`, `y**5*z` and `x**6*y**3*z**9`. + We wish to find out what is the maximal degree for each of `x`, `y` + and `z` variables:: + + >>> from sympy.polys.monomials import monomial_max + + >>> monomial_max((3,4,5), (0,5,1), (6,3,9)) + (6, 5, 9) + + """ + M = list(monoms[0]) + + for N in monoms[1:]: + for i, n in enumerate(N): + M[i] = max(M[i], n) + + return tuple(M) + +def monomial_min(*monoms): + """ + Returns minimal degree for each variable in a set of monomials. + + Examples + ======== + + Consider monomials `x**3*y**4*z**5`, `y**5*z` and `x**6*y**3*z**9`. + We wish to find out what is the minimal degree for each of `x`, `y` + and `z` variables:: + + >>> from sympy.polys.monomials import monomial_min + + >>> monomial_min((3,4,5), (0,5,1), (6,3,9)) + (0, 3, 1) + + """ + M = list(monoms[0]) + + for N in monoms[1:]: + for i, n in enumerate(N): + M[i] = min(M[i], n) + + return tuple(M) + +def monomial_deg(M): + """ + Returns the total degree of a monomial. + + Examples + ======== + + The total degree of `xy^2` is 3: + + >>> from sympy.polys.monomials import monomial_deg + >>> monomial_deg((1, 2)) + 3 + """ + return sum(M) + +def term_div(a, b, domain): + """Division of two terms in over a ring/field. """ + a_lm, a_lc = a + b_lm, b_lc = b + + monom = monomial_div(a_lm, b_lm) + + if domain.is_Field: + if monom is not None: + return monom, domain.quo(a_lc, b_lc) + else: + return None + else: + if not (monom is None or a_lc % b_lc): + return monom, domain.quo(a_lc, b_lc) + else: + return None + +class MonomialOps: + """Code generator of fast monomial arithmetic functions. """ + + @cacheit + def __new__(cls, ngens): + obj = super().__new__(cls) + obj.ngens = ngens + return obj + + def __getnewargs__(self): + return (self.ngens,) + + def _build(self, code, name): + ns = {} + exec(code, ns) + return ns[name] + + def _vars(self, name): + return [ "%s%s" % (name, i) for i in range(self.ngens) ] + + @cacheit + def mul(self): + name = "monomial_mul" + template = dedent("""\ + def %(name)s(A, B): + (%(A)s,) = A + (%(B)s,) = B + return (%(AB)s,) + """) + A = self._vars("a") + B = self._vars("b") + AB = [ "%s + %s" % (a, b) for a, b in zip(A, B) ] + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "AB": ", ".join(AB)} + return self._build(code, name) + + @cacheit + def pow(self): + name = "monomial_pow" + template = dedent("""\ + def %(name)s(A, k): + (%(A)s,) = A + return (%(Ak)s,) + """) + A = self._vars("a") + Ak = [ "%s*k" % a for a in A ] + code = template % {"name": name, "A": ", ".join(A), "Ak": ", ".join(Ak)} + return self._build(code, name) + + @cacheit + def mulpow(self): + name = "monomial_mulpow" + template = dedent("""\ + def %(name)s(A, B, k): + (%(A)s,) = A + (%(B)s,) = B + return (%(ABk)s,) + """) + A = self._vars("a") + B = self._vars("b") + ABk = [ "%s + %s*k" % (a, b) for a, b in zip(A, B) ] + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "ABk": ", ".join(ABk)} + return self._build(code, name) + + @cacheit + def ldiv(self): + name = "monomial_ldiv" + template = dedent("""\ + def %(name)s(A, B): + (%(A)s,) = A + (%(B)s,) = B + return (%(AB)s,) + """) + A = self._vars("a") + B = self._vars("b") + AB = [ "%s - %s" % (a, b) for a, b in zip(A, B) ] + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "AB": ", ".join(AB)} + return self._build(code, name) + + @cacheit + def div(self): + name = "monomial_div" + template = dedent("""\ + def %(name)s(A, B): + (%(A)s,) = A + (%(B)s,) = B + %(RAB)s + return (%(R)s,) + """) + A = self._vars("a") + B = self._vars("b") + RAB = [ "r%(i)s = a%(i)s - b%(i)s\n if r%(i)s < 0: return None" % {"i": i} for i in range(self.ngens) ] + R = self._vars("r") + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "RAB": "\n ".join(RAB), "R": ", ".join(R)} + return self._build(code, name) + + @cacheit + def lcm(self): + name = "monomial_lcm" + template = dedent("""\ + def %(name)s(A, B): + (%(A)s,) = A + (%(B)s,) = B + return (%(AB)s,) + """) + A = self._vars("a") + B = self._vars("b") + AB = [ "%s if %s >= %s else %s" % (a, a, b, b) for a, b in zip(A, B) ] + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "AB": ", ".join(AB)} + return self._build(code, name) + + @cacheit + def gcd(self): + name = "monomial_gcd" + template = dedent("""\ + def %(name)s(A, B): + (%(A)s,) = A + (%(B)s,) = B + return (%(AB)s,) + """) + A = self._vars("a") + B = self._vars("b") + AB = [ "%s if %s <= %s else %s" % (a, a, b, b) for a, b in zip(A, B) ] + code = template % {"name": name, "A": ", ".join(A), "B": ", ".join(B), "AB": ", ".join(AB)} + return self._build(code, name) + +@public +class Monomial(PicklableWithSlots): + """Class representing a monomial, i.e. a product of powers. """ + + __slots__ = ('exponents', 'gens') + + def __init__(self, monom, gens=None): + if not iterable(monom): + rep, gens = dict_from_expr(sympify(monom), gens=gens) + if len(rep) == 1 and list(rep.values())[0] == 1: + monom = list(rep.keys())[0] + else: + raise ValueError("Expected a monomial got {}".format(monom)) + + self.exponents = tuple(map(int, monom)) + self.gens = gens + + def rebuild(self, exponents, gens=None): + return self.__class__(exponents, gens or self.gens) + + def __len__(self): + return len(self.exponents) + + def __iter__(self): + return iter(self.exponents) + + def __getitem__(self, item): + return self.exponents[item] + + def __hash__(self): + return hash((self.__class__.__name__, self.exponents, self.gens)) + + def __str__(self): + if self.gens: + return "*".join([ "%s**%s" % (gen, exp) for gen, exp in zip(self.gens, self.exponents) ]) + else: + return "%s(%s)" % (self.__class__.__name__, self.exponents) + + def as_expr(self, *gens): + """Convert a monomial instance to a SymPy expression. """ + gens = gens or self.gens + + if not gens: + raise ValueError( + "Cannot convert %s to an expression without generators" % self) + + return Mul(*[ gen**exp for gen, exp in zip(gens, self.exponents) ]) + + def __eq__(self, other): + if isinstance(other, Monomial): + exponents = other.exponents + elif isinstance(other, (tuple, Tuple)): + exponents = other + else: + return False + + return self.exponents == exponents + + def __ne__(self, other): + return not self == other + + def __mul__(self, other): + if isinstance(other, Monomial): + exponents = other.exponents + elif isinstance(other, (tuple, Tuple)): + exponents = other + else: + raise NotImplementedError + + return self.rebuild(monomial_mul(self.exponents, exponents)) + + def __truediv__(self, other): + if isinstance(other, Monomial): + exponents = other.exponents + elif isinstance(other, (tuple, Tuple)): + exponents = other + else: + raise NotImplementedError + + result = monomial_div(self.exponents, exponents) + + if result is not None: + return self.rebuild(result) + else: + raise ExactQuotientFailed(self, Monomial(other)) + + __floordiv__ = __truediv__ + + def __pow__(self, other): + n = int(other) + if n < 0: + raise ValueError("a non-negative integer expected, got %s" % other) + return self.rebuild(monomial_pow(self.exponents, n)) + + def gcd(self, other): + """Greatest common divisor of monomials. """ + if isinstance(other, Monomial): + exponents = other.exponents + elif isinstance(other, (tuple, Tuple)): + exponents = other + else: + raise TypeError( + "an instance of Monomial class expected, got %s" % other) + + return self.rebuild(monomial_gcd(self.exponents, exponents)) + + def lcm(self, other): + """Least common multiple of monomials. """ + if isinstance(other, Monomial): + exponents = other.exponents + elif isinstance(other, (tuple, Tuple)): + exponents = other + else: + raise TypeError( + "an instance of Monomial class expected, got %s" % other) + + return self.rebuild(monomial_lcm(self.exponents, exponents)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/multivariate_resultants.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/multivariate_resultants.py new file mode 100644 index 0000000000000000000000000000000000000000..b6c967a8b981e25e8e26745804a658ff7b90e9af --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/multivariate_resultants.py @@ -0,0 +1,473 @@ +""" +This module contains functions for two multivariate resultants. These +are: + +- Dixon's resultant. +- Macaulay's resultant. + +Multivariate resultants are used to identify whether a multivariate +system has common roots. That is when the resultant is equal to zero. +""" +from math import prod + +from sympy.core.mul import Mul +from sympy.matrices.dense import (Matrix, diag) +from sympy.polys.polytools import (Poly, degree_list, rem) +from sympy.simplify.simplify import simplify +from sympy.tensor.indexed import IndexedBase +from sympy.polys.monomials import itermonomials, monomial_deg +from sympy.polys.orderings import monomial_key +from sympy.polys.polytools import poly_from_expr, total_degree +from sympy.functions.combinatorial.factorials import binomial +from itertools import combinations_with_replacement +from sympy.utilities.exceptions import sympy_deprecation_warning + +class DixonResultant(): + """ + A class for retrieving the Dixon's resultant of a multivariate + system. + + Examples + ======== + + >>> from sympy import symbols + + >>> from sympy.polys.multivariate_resultants import DixonResultant + >>> x, y = symbols('x, y') + + >>> p = x + y + >>> q = x ** 2 + y ** 3 + >>> h = x ** 2 + y + + >>> dixon = DixonResultant(variables=[x, y], polynomials=[p, q, h]) + >>> poly = dixon.get_dixon_polynomial() + >>> matrix = dixon.get_dixon_matrix(polynomial=poly) + >>> matrix + Matrix([ + [ 0, 0, -1, 0, -1], + [ 0, -1, 0, -1, 0], + [-1, 0, 1, 0, 0], + [ 0, -1, 0, 0, 1], + [-1, 0, 0, 1, 0]]) + >>> matrix.det() + 0 + + See Also + ======== + + Notebook in examples: sympy/example/notebooks. + + References + ========== + + .. [1] [Kapur1994]_ + .. [2] [Palancz08]_ + + """ + + def __init__(self, polynomials, variables): + """ + A class that takes two lists, a list of polynomials and list of + variables. Returns the Dixon matrix of the multivariate system. + + Parameters + ---------- + polynomials : list of polynomials + A list of m n-degree polynomials + variables: list + A list of all n variables + """ + self.polynomials = polynomials + self.variables = variables + + self.n = len(self.variables) + self.m = len(self.polynomials) + + a = IndexedBase("alpha") + # A list of n alpha variables (the replacing variables) + self.dummy_variables = [a[i] for i in range(self.n)] + + # A list of the d_max of each variable. + self._max_degrees = [max(degree_list(poly)[i] for poly in self.polynomials) + for i in range(self.n)] + + @property + def max_degrees(self): + sympy_deprecation_warning( + """ + The max_degrees property of DixonResultant is deprecated. + """, + deprecated_since_version="1.5", + active_deprecations_target="deprecated-dixonresultant-properties", + ) + return self._max_degrees + + def get_dixon_polynomial(self): + r""" + Returns + ======= + + dixon_polynomial: polynomial + Dixon's polynomial is calculated as: + + delta = Delta(A) / ((x_1 - a_1) ... (x_n - a_n)) where, + + A = |p_1(x_1,... x_n), ..., p_n(x_1,... x_n)| + |p_1(a_1,... x_n), ..., p_n(a_1,... x_n)| + |... , ..., ...| + |p_1(a_1,... a_n), ..., p_n(a_1,... a_n)| + """ + if self.m != (self.n + 1): + raise ValueError('Method invalid for given combination.') + + # First row + rows = [self.polynomials] + + temp = list(self.variables) + + for idx in range(self.n): + temp[idx] = self.dummy_variables[idx] + substitution = dict(zip(self.variables, temp)) + rows.append([f.subs(substitution) for f in self.polynomials]) + + A = Matrix(rows) + + terms = zip(self.variables, self.dummy_variables) + product_of_differences = Mul(*[a - b for a, b in terms]) + dixon_polynomial = (A.det() / product_of_differences).factor() + + return poly_from_expr(dixon_polynomial, self.dummy_variables)[0] + + def get_upper_degree(self): + sympy_deprecation_warning( + """ + The get_upper_degree() method of DixonResultant is deprecated. Use + get_max_degrees() instead. + """, + deprecated_since_version="1.5", + active_deprecations_target="deprecated-dixonresultant-properties" + ) + list_of_products = [self.variables[i] ** self._max_degrees[i] + for i in range(self.n)] + product = prod(list_of_products) + product = Poly(product).monoms() + + return monomial_deg(*product) + + def get_max_degrees(self, polynomial): + r""" + Returns a list of the maximum degree of each variable appearing + in the coefficients of the Dixon polynomial. The coefficients are + viewed as polys in $x_1, x_2, \dots, x_n$. + """ + deg_lists = [degree_list(Poly(poly, self.variables)) + for poly in polynomial.coeffs()] + + max_degrees = [max(degs) for degs in zip(*deg_lists)] + + return max_degrees + + def get_dixon_matrix(self, polynomial): + r""" + Construct the Dixon matrix from the coefficients of polynomial + \alpha. Each coefficient is viewed as a polynomial of x_1, ..., + x_n. + """ + + max_degrees = self.get_max_degrees(polynomial) + + # list of column headers of the Dixon matrix. + monomials = itermonomials(self.variables, max_degrees) + monomials = sorted(monomials, reverse=True, + key=monomial_key('lex', self.variables)) + + dixon_matrix = Matrix([[Poly(c, *self.variables).coeff_monomial(m) + for m in monomials] + for c in polynomial.coeffs()]) + + # remove columns if needed + if dixon_matrix.shape[0] != dixon_matrix.shape[1]: + keep = [column for column in range(dixon_matrix.shape[-1]) + if any(element != 0 for element + in dixon_matrix[:, column])] + + dixon_matrix = dixon_matrix[:, keep] + + return dixon_matrix + + def KSY_precondition(self, matrix): + """ + Test for the validity of the Kapur-Saxena-Yang precondition. + + The precondition requires that the column corresponding to the + monomial 1 = x_1 ^ 0 * x_2 ^ 0 * ... * x_n ^ 0 is not a linear + combination of the remaining ones. In SymPy notation this is + the last column. For the precondition to hold the last non-zero + row of the rref matrix should be of the form [0, 0, ..., 1]. + """ + if matrix.is_zero_matrix: + return False + + m, n = matrix.shape + + # simplify the matrix and keep only its non-zero rows + matrix = simplify(matrix.rref()[0]) + rows = [i for i in range(m) if any(matrix[i, j] != 0 for j in range(n))] + matrix = matrix[rows,:] + + condition = Matrix([[0]*(n-1) + [1]]) + + if matrix[-1,:] == condition: + return True + else: + return False + + def delete_zero_rows_and_columns(self, matrix): + """Remove the zero rows and columns of the matrix.""" + rows = [ + i for i in range(matrix.rows) if not matrix.row(i).is_zero_matrix] + cols = [ + j for j in range(matrix.cols) if not matrix.col(j).is_zero_matrix] + + return matrix[rows, cols] + + def product_leading_entries(self, matrix): + """Calculate the product of the leading entries of the matrix.""" + res = 1 + for row in range(matrix.rows): + for el in matrix.row(row): + if el != 0: + res = res * el + break + return res + + def get_KSY_Dixon_resultant(self, matrix): + """Calculate the Kapur-Saxena-Yang approach to the Dixon Resultant.""" + matrix = self.delete_zero_rows_and_columns(matrix) + _, U, _ = matrix.LUdecomposition() + matrix = self.delete_zero_rows_and_columns(simplify(U)) + + return self.product_leading_entries(matrix) + +class MacaulayResultant(): + """ + A class for calculating the Macaulay resultant. Note that the + polynomials must be homogenized and their coefficients must be + given as symbols. + + Examples + ======== + + >>> from sympy import symbols + + >>> from sympy.polys.multivariate_resultants import MacaulayResultant + >>> x, y, z = symbols('x, y, z') + + >>> a_0, a_1, a_2 = symbols('a_0, a_1, a_2') + >>> b_0, b_1, b_2 = symbols('b_0, b_1, b_2') + >>> c_0, c_1, c_2,c_3, c_4 = symbols('c_0, c_1, c_2, c_3, c_4') + + >>> f = a_0 * y - a_1 * x + a_2 * z + >>> g = b_1 * x ** 2 + b_0 * y ** 2 - b_2 * z ** 2 + >>> h = c_0 * y * z ** 2 - c_1 * x ** 3 + c_2 * x ** 2 * z - c_3 * x * z ** 2 + c_4 * z ** 3 + + >>> mac = MacaulayResultant(polynomials=[f, g, h], variables=[x, y, z]) + >>> mac.monomial_set + [x**4, x**3*y, x**3*z, x**2*y**2, x**2*y*z, x**2*z**2, x*y**3, + x*y**2*z, x*y*z**2, x*z**3, y**4, y**3*z, y**2*z**2, y*z**3, z**4] + >>> matrix = mac.get_matrix() + >>> submatrix = mac.get_submatrix(matrix) + >>> submatrix + Matrix([ + [-a_1, a_0, a_2, 0], + [ 0, -a_1, 0, 0], + [ 0, 0, -a_1, 0], + [ 0, 0, 0, -a_1]]) + + See Also + ======== + + Notebook in examples: sympy/example/notebooks. + + References + ========== + + .. [1] [Bruce97]_ + .. [2] [Stiller96]_ + + """ + def __init__(self, polynomials, variables): + """ + Parameters + ========== + + variables: list + A list of all n variables + polynomials : list of SymPy polynomials + A list of m n-degree polynomials + """ + self.polynomials = polynomials + self.variables = variables + self.n = len(variables) + + # A list of the d_max of each polynomial. + self.degrees = [total_degree(poly, *self.variables) for poly + in self.polynomials] + + self.degree_m = self._get_degree_m() + self.monomials_size = self.get_size() + + # The set T of all possible monomials of degree degree_m + self.monomial_set = self.get_monomials_of_certain_degree(self.degree_m) + + def _get_degree_m(self): + r""" + Returns + ======= + + degree_m: int + The degree_m is calculated as 1 + \sum_1 ^ n (d_i - 1), + where d_i is the degree of the i polynomial + """ + return 1 + sum(d - 1 for d in self.degrees) + + def get_size(self): + r""" + Returns + ======= + + size: int + The size of set T. Set T is the set of all possible + monomials of the n variables for degree equal to the + degree_m + """ + return binomial(self.degree_m + self.n - 1, self.n - 1) + + def get_monomials_of_certain_degree(self, degree): + """ + Returns + ======= + + monomials: list + A list of monomials of a certain degree. + """ + monomials = [Mul(*monomial) for monomial + in combinations_with_replacement(self.variables, + degree)] + + return sorted(monomials, reverse=True, + key=monomial_key('lex', self.variables)) + + def get_row_coefficients(self): + """ + Returns + ======= + + row_coefficients: list + The row coefficients of Macaulay's matrix + """ + row_coefficients = [] + divisible = [] + for i in range(self.n): + if i == 0: + degree = self.degree_m - self.degrees[i] + monomial = self.get_monomials_of_certain_degree(degree) + row_coefficients.append(monomial) + else: + divisible.append(self.variables[i - 1] ** + self.degrees[i - 1]) + degree = self.degree_m - self.degrees[i] + poss_rows = self.get_monomials_of_certain_degree(degree) + for div in divisible: + for p in poss_rows: + if rem(p, div) == 0: + poss_rows = [item for item in poss_rows + if item != p] + row_coefficients.append(poss_rows) + return row_coefficients + + def get_matrix(self): + """ + Returns + ======= + + macaulay_matrix: Matrix + The Macaulay numerator matrix + """ + rows = [] + row_coefficients = self.get_row_coefficients() + for i in range(self.n): + for multiplier in row_coefficients[i]: + coefficients = [] + poly = Poly(self.polynomials[i] * multiplier, + *self.variables) + + for mono in self.monomial_set: + coefficients.append(poly.coeff_monomial(mono)) + rows.append(coefficients) + + macaulay_matrix = Matrix(rows) + return macaulay_matrix + + def get_reduced_nonreduced(self): + r""" + Returns + ======= + + reduced: list + A list of the reduced monomials + non_reduced: list + A list of the monomials that are not reduced + + Definition + ========== + + A polynomial is said to be reduced in x_i, if its degree (the + maximum degree of its monomials) in x_i is less than d_i. A + polynomial that is reduced in all variables but one is said + simply to be reduced. + """ + divisible = [] + for m in self.monomial_set: + temp = [] + for i, v in enumerate(self.variables): + temp.append(bool(total_degree(m, v) >= self.degrees[i])) + divisible.append(temp) + reduced = [i for i, r in enumerate(divisible) + if sum(r) < self.n - 1] + non_reduced = [i for i, r in enumerate(divisible) + if sum(r) >= self.n -1] + + return reduced, non_reduced + + def get_submatrix(self, matrix): + r""" + Returns + ======= + + macaulay_submatrix: Matrix + The Macaulay denominator matrix. Columns that are non reduced are kept. + The row which contains one of the a_{i}s is dropped. a_{i}s + are the coefficients of x_i ^ {d_i}. + """ + reduced, non_reduced = self.get_reduced_nonreduced() + + # if reduced == [], then det(matrix) should be 1 + if reduced == []: + return diag([1]) + + # reduced != [] + reduction_set = [v ** self.degrees[i] for i, v + in enumerate(self.variables)] + + ais = [self.polynomials[i].coeff(reduction_set[i]) + for i in range(self.n)] + + reduced_matrix = matrix[:, reduced] + keep = [] + for row in range(reduced_matrix.rows): + check = [ai in reduced_matrix[row, :] for ai in ais] + if True not in check: + keep.append(row) + + return matrix[keep, non_reduced] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..38403fdf80be22d47589a346d1b1878b982c3c93 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/__init__.py @@ -0,0 +1,27 @@ +"""Computational algebraic field theory. """ + +__all__ = [ + 'minpoly', 'minimal_polynomial', + + 'field_isomorphism', 'primitive_element', 'to_number_field', + + 'isolate', + + 'round_two', + + 'prime_decomp', 'prime_valuation', + + 'galois_group', +] + +from .minpoly import minpoly, minimal_polynomial + +from .subfield import field_isomorphism, primitive_element, to_number_field + +from .utilities import isolate + +from .basis import round_two + +from .primes import prime_decomp, prime_valuation + +from .galoisgroups import galois_group diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..6989cd805881fdd4f0ec3ab041b61b8d1bc790d4 Binary files /dev/null and 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""" + +from sympy.polys.polytools import Poly +from sympy.polys.domains.algebraicfield import AlgebraicField +from sympy.polys.domains.integerring import ZZ +from sympy.polys.domains.rationalfield import QQ +from sympy.utilities.decorator import public +from .modules import ModuleEndomorphism, ModuleHomomorphism, PowerBasis +from .utilities import extract_fundamental_discriminant + + +def _apply_Dedekind_criterion(T, p): + r""" + Apply the "Dedekind criterion" to test whether the order needs to be + enlarged relative to a given prime *p*. + """ + x = T.gen + T_bar = Poly(T, modulus=p) + lc, fl = T_bar.factor_list() + assert lc == 1 + g_bar = Poly(1, x, modulus=p) + for ti_bar, _ in fl: + g_bar *= ti_bar + h_bar = T_bar // g_bar + g = Poly(g_bar, domain=ZZ) + h = Poly(h_bar, domain=ZZ) + f = (g * h - T) // p + f_bar = Poly(f, modulus=p) + Z_bar = f_bar + for b in [g_bar, h_bar]: + Z_bar = Z_bar.gcd(b) + U_bar = T_bar // Z_bar + m = Z_bar.degree() + return U_bar, m + + +def nilradical_mod_p(H, p, q=None): + r""" + Compute the nilradical mod *p* for a given order *H*, and prime *p*. + + Explanation + =========== + + This is the ideal $I$ in $H/pH$ consisting of all elements some positive + power of which is zero in this quotient ring, i.e. is a multiple of *p*. + + Parameters + ========== + + H : :py:class:`~.Submodule` + The given order. + p : int + The rational prime. + q : int, optional + If known, the smallest power of *p* that is $>=$ the dimension of *H*. + If not provided, we compute it here. + + Returns + ======= + + :py:class:`~.Module` representing the nilradical mod *p* in *H*. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory*. + (See Lemma 6.1.6.) + + """ + n = H.n + if q is None: + q = p + while q < n: + q *= p + phi = ModuleEndomorphism(H, lambda x: x**q) + return phi.kernel(modulus=p) + + +def _second_enlargement(H, p, q): + r""" + Perform the second enlargement in the Round Two algorithm. + """ + Ip = nilradical_mod_p(H, p, q=q) + B = H.parent.submodule_from_matrix(H.matrix * Ip.matrix, denom=H.denom) + C = B + p*H + E = C.endomorphism_ring() + phi = ModuleHomomorphism(H, E, lambda x: E.inner_endomorphism(x)) + gamma = phi.kernel(modulus=p) + G = H.parent.submodule_from_matrix(H.matrix * gamma.matrix, denom=H.denom * p) + H1 = G + H + return H1, Ip + + +@public +def round_two(T, radicals=None): + r""" + Zassenhaus's "Round 2" algorithm. + + Explanation + =========== + + Carry out Zassenhaus's "Round 2" algorithm on an irreducible polynomial + *T* over :ref:`ZZ` or :ref:`QQ`. This computes an integral basis and the + discriminant for the field $K = \mathbb{Q}[x]/(T(x))$. + + Alternatively, you may pass an :py:class:`~.AlgebraicField` instance, in + place of the polynomial *T*, in which case the algorithm is applied to the + minimal polynomial for the field's primitive element. + + Ordinarily this function need not be called directly, as one can instead + access the :py:meth:`~.AlgebraicField.maximal_order`, + :py:meth:`~.AlgebraicField.integral_basis`, and + :py:meth:`~.AlgebraicField.discriminant` methods of an + :py:class:`~.AlgebraicField`. + + Examples + ======== + + Working through an AlgebraicField: + + >>> from sympy import Poly, QQ + >>> from sympy.abc import x + >>> T = Poly(x ** 3 + x ** 2 - 2 * x + 8) + >>> K = QQ.alg_field_from_poly(T, "theta") + >>> print(K.maximal_order()) + Submodule[[2, 0, 0], [0, 2, 0], [0, 1, 1]]/2 + >>> print(K.discriminant()) + -503 + >>> print(K.integral_basis(fmt='sympy')) + [1, theta, theta/2 + theta**2/2] + + Calling directly: + + >>> from sympy import Poly + >>> from sympy.abc import x + >>> from sympy.polys.numberfields.basis import round_two + >>> T = Poly(x ** 3 + x ** 2 - 2 * x + 8) + >>> print(round_two(T)) + (Submodule[[2, 0, 0], [0, 2, 0], [0, 1, 1]]/2, -503) + + The nilradicals mod $p$ that are sometimes computed during the Round Two + algorithm may be useful in further calculations. Pass a dictionary under + `radicals` to receive these: + + >>> T = Poly(x**3 + 3*x**2 + 5) + >>> rad = {} + >>> ZK, dK = round_two(T, radicals=rad) + >>> print(rad) + {3: Submodule[[-1, 1, 0], [-1, 0, 1]]} + + Parameters + ========== + + T : :py:class:`~.Poly`, :py:class:`~.AlgebraicField` + Either (1) the irreducible polynomial over :ref:`ZZ` or :ref:`QQ` + defining the number field, or (2) an :py:class:`~.AlgebraicField` + representing the number field itself. + + radicals : dict, optional + This is a way for any $p$-radicals (if computed) to be returned by + reference. If desired, pass an empty dictionary. If the algorithm + reaches the point where it computes the nilradical mod $p$ of the ring + of integers $Z_K$, then an $\mathbb{F}_p$-basis for this ideal will be + stored in this dictionary under the key ``p``. This can be useful for + other algorithms, such as prime decomposition. + + Returns + ======= + + Pair ``(ZK, dK)``, where: + + ``ZK`` is a :py:class:`~sympy.polys.numberfields.modules.Submodule` + representing the maximal order. + + ``dK`` is the discriminant of the field $K = \mathbb{Q}[x]/(T(x))$. + + See Also + ======== + + .AlgebraicField.maximal_order + .AlgebraicField.integral_basis + .AlgebraicField.discriminant + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + + """ + K = None + if isinstance(T, AlgebraicField): + K, T = T, T.ext.minpoly_of_element() + if ( not T.is_univariate + or not T.is_irreducible + or T.domain not in [ZZ, QQ]): + raise ValueError('Round 2 requires an irreducible univariate polynomial over ZZ or QQ.') + T, _ = T.make_monic_over_integers_by_scaling_roots() + n = T.degree() + D = T.discriminant() + D_modulus = ZZ.from_sympy(abs(D)) + # D must be 0 or 1 mod 4 (see Cohen Sec 4.4), which ensures we can write + # it in the form D = D_0 * F**2, where D_0 is 1 or a fundamental discriminant. + _, F = extract_fundamental_discriminant(D) + Ztheta = PowerBasis(K or T) + H = Ztheta.whole_submodule() + nilrad = None + while F: + # Next prime: + p, e = F.popitem() + U_bar, m = _apply_Dedekind_criterion(T, p) + if m == 0: + continue + # For a given prime p, the first enlargement of the order spanned by + # the current basis can be done in a simple way: + U = Ztheta.element_from_poly(Poly(U_bar, domain=ZZ)) + # TODO: + # Theory says only first m columns of the U//p*H term below are needed. + # Could be slightly more efficient to use only those. Maybe `Submodule` + # class should support a slice operator? + H = H.add(U // p * H, hnf_modulus=D_modulus) + if e <= m: + continue + # A second, and possibly more, enlargements for p will be needed. + # These enlargements require a more involved procedure. + q = p + while q < n: + q *= p + H1, nilrad = _second_enlargement(H, p, q) + while H1 != H: + H = H1 + H1, nilrad = _second_enlargement(H, p, q) + # Note: We do not store all nilradicals mod p, only the very last. This is + # because, unless computed against the entire integral basis, it might not + # be accurate. (In other words, if H was not already equal to ZK when we + # passed it to `_second_enlargement`, then we can't trust the nilradical + # so computed.) Example: if T(x) = x ** 3 + 15 * x ** 2 - 9 * x + 13, then + # F is divisible by 2, 3, and 7, and the nilradical mod 2 as computed above + # will not be accurate for the full, maximal order ZK. + if nilrad is not None and isinstance(radicals, dict): + radicals[p] = nilrad + ZK = H + # Pre-set expensive boolean properties which we already know to be true: + ZK._starts_with_unity = True + ZK._is_sq_maxrank_HNF = True + dK = (D * ZK.matrix.det() ** 2) // ZK.denom ** (2 * n) + return ZK, dK diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/exceptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/exceptions.py new file mode 100644 index 0000000000000000000000000000000000000000..6e0d1ddc23c39295626fa036cf34974f50e4f53a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/exceptions.py @@ -0,0 +1,54 @@ +"""Special exception classes for numberfields. """ + + +class ClosureFailure(Exception): + r""" + Signals that a :py:class:`ModuleElement` which we tried to represent in a + certain :py:class:`Module` cannot in fact be represented there. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly, ZZ + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.numberfields.modules import PowerBasis, to_col + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + + Because we are in a cyclotomic field, the power basis ``A`` is an integral + basis, and the submodule ``B`` is just the ideal $(2)$. Therefore ``B`` can + represent an element having all even coefficients over the power basis: + + >>> a1 = A(to_col([2, 4, 6, 8])) + >>> print(B.represent(a1)) + DomainMatrix([[1], [2], [3], [4]], (4, 1), ZZ) + + but ``B`` cannot represent an element with an odd coefficient: + + >>> a2 = A(to_col([1, 2, 2, 2])) + >>> B.represent(a2) + Traceback (most recent call last): + ... + ClosureFailure: Element in QQ-span but not ZZ-span of this basis. + + """ + pass + + +class StructureError(Exception): + r""" + Represents cases in which an algebraic structure was expected to have a + certain property, or be of a certain type, but was not. + """ + pass + + +class MissingUnityError(StructureError): + r"""Structure should contain a unity element but does not.""" + pass + + +__all__ = [ + 'ClosureFailure', 'StructureError', 'MissingUnityError', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galois_resolvents.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galois_resolvents.py new file mode 100644 index 0000000000000000000000000000000000000000..5d73b56870a498f09102787da3517e7520edb3db --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galois_resolvents.py @@ -0,0 +1,676 @@ +r""" +Galois resolvents + +Each of the functions in ``sympy.polys.numberfields.galoisgroups`` that +computes Galois groups for a particular degree $n$ uses resolvents. Given the +polynomial $T$ whose Galois group is to be computed, a resolvent is a +polynomial $R$ whose roots are defined as functions of the roots of $T$. + +One way to compute the coefficients of $R$ is by approximating the roots of $T$ +to sufficient precision. This module defines a :py:class:`~.Resolvent` class +that handles this job, determining the necessary precision, and computing $R$. + +In some cases, the coefficients of $R$ are symmetric in the roots of $T$, +meaning they are equal to fixed functions of the coefficients of $T$. Therefore +another approach is to compute these functions once and for all, and record +them in a lookup table. This module defines code that can compute such tables. +The tables for polynomials $T$ of degrees 4 through 6, produced by this code, +are recorded in the resolvent_lookup.py module. + +""" + +from sympy.core.evalf import ( + evalf, fastlog, _evalf_with_bounded_error, quad_to_mpmath, +) +from sympy.core.symbol import symbols, Dummy +from sympy.polys.densetools import dup_eval +from sympy.polys.domains import ZZ +from sympy.polys.orderings import lex +from sympy.polys.polyroots import preprocess_roots +from sympy.polys.polytools import Poly +from sympy.polys.rings import xring +from sympy.polys.specialpolys import symmetric_poly +from sympy.utilities.lambdify import lambdify + +from mpmath import MPContext +from mpmath.libmp.libmpf import prec_to_dps + + +class GaloisGroupException(Exception): + ... + + +class ResolventException(GaloisGroupException): + ... + + +class Resolvent: + r""" + If $G$ is a subgroup of the symmetric group $S_n$, + $F$ a multivariate polynomial in $\mathbb{Z}[X_1, \ldots, X_n]$, + $H$ the stabilizer of $F$ in $G$ (i.e. the permutations $\sigma$ such that + $F(X_{\sigma(1)}, \ldots, X_{\sigma(n)}) = F(X_1, \ldots, X_n)$), and $s$ + a set of left coset representatives of $H$ in $G$, then the resolvent + polynomial $R(Y)$ is the product over $\sigma \in s$ of + $Y - F(X_{\sigma(1)}, \ldots, X_{\sigma(n)})$. + + For example, consider the resolvent for the form + $$F = X_0 X_2 + X_1 X_3$$ + and the group $G = S_4$. In this case, the stabilizer $H$ is the dihedral + group $D4 = < (0123), (02) >$, and a set of representatives of $G/H$ is + $\{I, (01), (03)\}$. The resolvent can be constructed as follows: + + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy.core.symbol import symbols + >>> from sympy.polys.numberfields.galoisgroups import Resolvent + >>> X = symbols('X0 X1 X2 X3') + >>> F = X[0]*X[2] + X[1]*X[3] + >>> s = [Permutation([0, 1, 2, 3]), Permutation([1, 0, 2, 3]), + ... Permutation([3, 1, 2, 0])] + >>> R = Resolvent(F, X, s) + + This resolvent has three roots, which are the conjugates of ``F`` under the + three permutations in ``s``: + + >>> R.root_lambdas[0](*X) + X0*X2 + X1*X3 + >>> R.root_lambdas[1](*X) + X0*X3 + X1*X2 + >>> R.root_lambdas[2](*X) + X0*X1 + X2*X3 + + Resolvents are useful for computing Galois groups. Given a polynomial $T$ + of degree $n$, we will use a resolvent $R$ where $Gal(T) \leq G \leq S_n$. + We will then want to substitute the roots of $T$ for the variables $X_i$ + in $R$, and study things like the discriminant of $R$, and the way $R$ + factors over $\mathbb{Q}$. + + From the symmetry in $R$'s construction, and since $Gal(T) \leq G$, we know + from Galois theory that the coefficients of $R$ must lie in $\mathbb{Z}$. + This allows us to compute the coefficients of $R$ by approximating the + roots of $T$ to sufficient precision, plugging these values in for the + variables $X_i$ in the coefficient expressions of $R$, and then simply + rounding to the nearest integer. + + In order to determine a sufficient precision for the roots of $T$, this + ``Resolvent`` class imposes certain requirements on the form ``F``. It + could be possible to design a different ``Resolvent`` class, that made + different precision estimates, and different assumptions about ``F``. + + ``F`` must be homogeneous, and all terms must have unit coefficient. + Furthermore, if $r$ is the number of terms in ``F``, and $t$ the total + degree, and if $m$ is the number of conjugates of ``F``, i.e. the number + of permutations in ``s``, then we require that $m < r 2^t$. Again, it is + not impossible to work with forms ``F`` that violate these assumptions, but + this ``Resolvent`` class requires them. + + Since determining the integer coefficients of the resolvent for a given + polynomial $T$ is one of the main problems this class solves, we take some + time to explain the precision bounds it uses. + + The general problem is: + Given a multivariate polynomial $P \in \mathbb{Z}[X_1, \ldots, X_n]$, and a + bound $M \in \mathbb{R}_+$, compute an $\varepsilon > 0$ such that for any + complex numbers $a_1, \ldots, a_n$ with $|a_i| < M$, if the $a_i$ are + approximated to within an accuracy of $\varepsilon$ by $b_i$, that is, + $|a_i - b_i| < \varepsilon$ for $i = 1, \ldots, n$, then + $|P(a_1, \ldots, a_n) - P(b_1, \ldots, b_n)| < 1/2$. In other words, if it + is known that $P(a_1, \ldots, a_n) = c$ for some $c \in \mathbb{Z}$, then + $P(b_1, \ldots, b_n)$ can be rounded to the nearest integer in order to + determine $c$. + + To derive our error bound, consider the monomial $xyz$. Defining + $d_i = b_i - a_i$, our error is + $|(a_1 + d_1)(a_2 + d_2)(a_3 + d_3) - a_1 a_2 a_3|$, which is bounded + above by $|(M + \varepsilon)^3 - M^3|$. Passing to a general monomial of + total degree $t$, this expression is bounded by + $M^{t-1}\varepsilon(t + 2^t\varepsilon/M)$ provided $\varepsilon < M$, + and by $(t+1)M^{t-1}\varepsilon$ provided $\varepsilon < M/2^t$. + But since our goal is to make the error less than $1/2$, we will choose + $\varepsilon < 1/(2(t+1)M^{t-1})$, which implies the condition that + $\varepsilon < M/2^t$, as long as $M \geq 2$. + + Passing from the general monomial to the general polynomial is easy, by + scaling and summing error bounds. + + In our specific case, we are given a homogeneous polynomial $F$ of + $r$ terms and total degree $t$, all of whose coefficients are $\pm 1$. We + are given the $m$ permutations that make the conjugates of $F$, and + we want to bound the error in the coefficients of the monic polynomial + $R(Y)$ having $F$ and its conjugates as roots (i.e. the resolvent). + + For $j$ from $1$ to $m$, the coefficient of $Y^{m-j}$ in $R(Y)$ is the + $j$th elementary symmetric polynomial in the conjugates of $F$. This sums + the products of these conjugates, taken $j$ at a time, in all possible + combinations. There are $\binom{m}{j}$ such combinations, and each product + of $j$ conjugates of $F$ expands to a sum of $r^j$ terms, each of unit + coefficient, and total degree $jt$. An error bound for the $j$th coeff of + $R$ is therefore + $$\binom{m}{j} r^j (jt + 1) M^{jt - 1} \varepsilon$$ + When our goal is to evaluate all the coefficients of $R$, we will want to + use the maximum of these error bounds. It is clear that this bound is + strictly increasing for $j$ up to the ceiling of $m/2$. After that point, + the first factor $\binom{m}{j}$ begins to decrease, while the others + continue to increase. However, the binomial coefficient never falls by more + than a factor of $1/m$ at a time, so our assumptions that $M \geq 2$ and + $m < r 2^t$ are enough to tell us that the constant coefficient of $R$, + i.e. that where $j = m$, has the largest error bound. Therefore we can use + $$r^m (mt + 1) M^{mt - 1} \varepsilon$$ + as our error bound for all the coefficients. + + Note that this bound is also (more than) adequate to determine whether any + of the roots of $R$ is an integer. Each of these roots is a single + conjugate of $F$, which contains less error than the trace, i.e. the + coefficient of $Y^{m - 1}$. By rounding the roots of $R$ to the nearest + integers, we therefore get all the candidates for integer roots of $R$. By + plugging these candidates into $R$, we can check whether any of them + actually is a root. + + Note: We take the definition of resolvent from Cohen, but the error bound + is ours. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory*. + (Def 6.3.2) + + """ + + def __init__(self, F, X, s): + r""" + Parameters + ========== + + F : :py:class:`~.Expr` + polynomial in the symbols in *X* + X : list of :py:class:`~.Symbol` + s : list of :py:class:`~.Permutation` + representing the cosets of the stabilizer of *F* in + some subgroup $G$ of $S_n$, where $n$ is the length of *X*. + """ + self.F = F + self.X = X + self.s = s + + # Number of conjugates: + self.m = len(s) + # Total degree of F (computed below): + self.t = None + # Number of terms in F (computed below): + self.r = 0 + + for monom, coeff in Poly(F).terms(): + if abs(coeff) != 1: + raise ResolventException('Resolvent class expects forms with unit coeffs') + t = sum(monom) + if t != self.t and self.t is not None: + raise ResolventException('Resolvent class expects homogeneous forms') + self.t = t + self.r += 1 + + m, t, r = self.m, self.t, self.r + if not m < r * 2**t: + raise ResolventException('Resolvent class expects m < r*2^t') + M = symbols('M') + # Precision sufficient for computing the coeffs of the resolvent: + self.coeff_prec_func = Poly(r**m*(m*t + 1)*M**(m*t - 1)) + # Precision sufficient for checking whether any of the roots of the + # resolvent are integers: + self.root_prec_func = Poly(r*(t + 1)*M**(t - 1)) + + # The conjugates of F are the roots of the resolvent. + # For evaluating these to required numerical precisions, we need + # lambdified versions. + # Note: for a given permutation sigma, the conjugate (sigma F) is + # equivalent to lambda [sigma^(-1) X]: F. + self.root_lambdas = [ + lambdify((~s[j])(X), F) + for j in range(self.m) + ] + + # For evaluating the coeffs, we'll also need lambdified versions of + # the elementary symmetric functions for degree m. + Y = symbols('Y') + R = symbols(' '.join(f'R{i}' for i in range(m))) + f = 1 + for r in R: + f *= (Y - r) + C = Poly(f, Y).coeffs() + self.esf_lambdas = [lambdify(R, c) for c in C] + + def get_prec(self, M, target='coeffs'): + r""" + For a given upper bound *M* on the magnitude of the complex numbers to + be plugged in for this resolvent's symbols, compute a sufficient + precision for evaluating those complex numbers, such that the + coefficients, or the integer roots, of the resolvent can be determined. + + Parameters + ========== + + M : real number + Upper bound on magnitude of the complex numbers to be plugged in. + + target : str, 'coeffs' or 'roots', default='coeffs' + Name the task for which a sufficient precision is desired. + This is either determining the coefficients of the resolvent + ('coeffs') or determining its possible integer roots ('roots'). + The latter may require significantly lower precision. + + Returns + ======= + + int $m$ + such that $2^{-m}$ is a sufficient upper bound on the + error in approximating the complex numbers to be plugged in. + + """ + # As explained in the docstring for this class, our precision estimates + # require that M be at least 2. + M = max(M, 2) + f = self.coeff_prec_func if target == 'coeffs' else self.root_prec_func + r, _, _, _ = evalf(2*f(M), 1, {}) + return fastlog(r) + 1 + + def approximate_roots_of_poly(self, T, target='coeffs'): + """ + Approximate the roots of a given polynomial *T* to sufficient precision + in order to evaluate this resolvent's coefficients, or determine + whether the resolvent has an integer root. + + Parameters + ========== + + T : :py:class:`~.Poly` + + target : str, 'coeffs' or 'roots', default='coeffs' + Set the approximation precision to be sufficient for the desired + task, which is either determining the coefficients of the resolvent + ('coeffs') or determining its possible integer roots ('roots'). + The latter may require significantly lower precision. + + Returns + ======= + + list of elements of :ref:`CC` + + """ + ctx = MPContext() + # Because sympy.polys.polyroots._integer_basis() is called when a CRootOf + # is formed, we proactively extract the integer basis now. This means that + # when we call T.all_roots(), every root will be a CRootOf, not a Mul + # of Integer*CRootOf. + coeff, T = preprocess_roots(T) + coeff = ctx.mpf(str(coeff)) + + scaled_roots = T.all_roots(radicals=False) + + # Since we're going to be approximating the roots of T anyway, we can + # get a good upper bound on the magnitude of the roots by starting with + # a very low precision approx. + approx0 = [coeff * quad_to_mpmath(_evalf_with_bounded_error(r, m=0)) for r in scaled_roots] + # Here we add 1 to account for the possible error in our initial approximation. + M = max(abs(b) for b in approx0) + 1 + m = self.get_prec(M, target=target) + n = fastlog(M._mpf_) + 1 + p = m + n + 1 + ctx.prec = p + d = prec_to_dps(p) + + approx1 = [r.eval_approx(d, return_mpmath=True) for r in scaled_roots] + approx1 = [coeff*ctx.mpc(r) for r in approx1] + + return approx1 + + @staticmethod + def round_mpf(a): + if isinstance(a, int): + return a + # If we use python's built-in `round()`, we lose precision. + # If we use `ZZ` directly, we may add or subtract 1. + # + # XXX: We have to convert to int before converting to ZZ because + # flint.fmpz cannot convert a mpmath mpf. + return ZZ(int(a.context.nint(a))) + + def round_roots_to_integers_for_poly(self, T): + """ + For a given polynomial *T*, round the roots of this resolvent to the + nearest integers. + + Explanation + =========== + + None of the integers returned by this method is guaranteed to be a + root of the resolvent; however, if the resolvent has any integer roots + (for the given polynomial *T*), then they must be among these. + + If the coefficients of the resolvent are also desired, then this method + should not be used. Instead, use the ``eval_for_poly`` method. This + method may be significantly faster than ``eval_for_poly``. + + Parameters + ========== + + T : :py:class:`~.Poly` + + Returns + ======= + + dict + Keys are the indices of those permutations in ``self.s`` such that + the corresponding root did round to a rational integer. + + Values are :ref:`ZZ`. + + + """ + approx_roots_of_T = self.approximate_roots_of_poly(T, target='roots') + approx_roots_of_self = [r(*approx_roots_of_T) for r in self.root_lambdas] + return { + i: self.round_mpf(r.real) + for i, r in enumerate(approx_roots_of_self) + if self.round_mpf(r.imag) == 0 + } + + def eval_for_poly(self, T, find_integer_root=False): + r""" + Compute the integer values of the coefficients of this resolvent, when + plugging in the roots of a given polynomial. + + Parameters + ========== + + T : :py:class:`~.Poly` + + find_integer_root : ``bool``, default ``False`` + If ``True``, then also determine whether the resolvent has an + integer root, and return the first one found, along with its + index, i.e. the index of the permutation ``self.s[i]`` it + corresponds to. + + Returns + ======= + + Tuple ``(R, a, i)`` + + ``R`` is this resolvent as a dense univariate polynomial over + :ref:`ZZ`, i.e. a list of :ref:`ZZ`. + + If *find_integer_root* was ``True``, then ``a`` and ``i`` are the + first integer root found, and its index, if one exists. + Otherwise ``a`` and ``i`` are both ``None``. + + """ + approx_roots_of_T = self.approximate_roots_of_poly(T, target='coeffs') + approx_roots_of_self = [r(*approx_roots_of_T) for r in self.root_lambdas] + approx_coeffs_of_self = [c(*approx_roots_of_self) for c in self.esf_lambdas] + + R = [] + for c in approx_coeffs_of_self: + if self.round_mpf(c.imag) != 0: + # If precision was enough, this should never happen. + raise ResolventException(f"Got non-integer coeff for resolvent: {c}") + R.append(self.round_mpf(c.real)) + + a0, i0 = None, None + + if find_integer_root: + for i, r in enumerate(approx_roots_of_self): + if self.round_mpf(r.imag) != 0: + continue + if not dup_eval(R, (a := self.round_mpf(r.real)), ZZ): + a0, i0 = a, i + break + + return R, a0, i0 + + +def wrap(text, width=80): + """Line wrap a polynomial expression. """ + out = '' + col = 0 + for c in text: + if c == ' ' and col > width: + c, col = '\n', 0 + else: + col += 1 + out += c + return out + + +def s_vars(n): + """Form the symbols s1, s2, ..., sn to stand for elem. symm. polys. """ + return symbols([f's{i + 1}' for i in range(n)]) + + +def sparse_symmetrize_resolvent_coeffs(F, X, s, verbose=False): + """ + Compute the coefficients of a resolvent as functions of the coefficients of + the associated polynomial. + + F must be a sparse polynomial. + """ + import time, sys + # Roots of resolvent as multivariate forms over vars X: + root_forms = [ + F.compose(list(zip(X, sigma(X)))) + for sigma in s + ] + + # Coeffs of resolvent (besides lead coeff of 1) as symmetric forms over vars X: + Y = [Dummy(f'Y{i}') for i in range(len(s))] + coeff_forms = [] + for i in range(1, len(s) + 1): + if verbose: + print('----') + print(f'Computing symmetric poly of degree {i}...') + sys.stdout.flush() + t0 = time.time() + G = symmetric_poly(i, *Y) + t1 = time.time() + if verbose: + print(f'took {t1 - t0} seconds') + print('lambdifying...') + sys.stdout.flush() + t0 = time.time() + C = lambdify(Y, (-1)**i*G) + t1 = time.time() + if verbose: + print(f'took {t1 - t0} seconds') + sys.stdout.flush() + coeff_forms.append(C) + + coeffs = [] + for i, f in enumerate(coeff_forms): + if verbose: + print('----') + print(f'Plugging root forms into elem symm poly {i+1}...') + sys.stdout.flush() + t0 = time.time() + g = f(*root_forms) + t1 = time.time() + coeffs.append(g) + if verbose: + print(f'took {t1 - t0} seconds') + sys.stdout.flush() + + # Now symmetrize these coeffs. This means recasting them as polynomials in + # the elementary symmetric polys over X. + symmetrized = [] + symmetrization_times = [] + ss = s_vars(len(X)) + for i, A in list(enumerate(coeffs)): + if verbose: + print('-----') + print(f'Coeff {i+1}...') + sys.stdout.flush() + t0 = time.time() + B, rem, _ = A.symmetrize() + t1 = time.time() + if rem != 0: + msg = f"Got nonzero remainder {rem} for resolvent (F, X, s) = ({F}, {X}, {s})" + raise ResolventException(msg) + B_str = str(B.as_expr(*ss)) + symmetrized.append(B_str) + symmetrization_times.append(t1 - t0) + if verbose: + print(wrap(B_str)) + print(f'took {t1 - t0} seconds') + sys.stdout.flush() + + return symmetrized, symmetrization_times + + +def define_resolvents(): + """Define all the resolvents for polys T of degree 4 through 6. """ + from sympy.combinatorics.galois import PGL2F5 + from sympy.combinatorics.permutations import Permutation + + R4, X4 = xring("X0,X1,X2,X3", ZZ, lex) + X = X4 + + # The one resolvent used in `_galois_group_degree_4_lookup()`: + F40 = X[0]*X[1]**2 + X[1]*X[2]**2 + X[2]*X[3]**2 + X[3]*X[0]**2 + s40 = [ + Permutation(3), + Permutation(3)(0, 1), + Permutation(3)(0, 2), + Permutation(3)(0, 3), + Permutation(3)(1, 2), + Permutation(3)(2, 3), + ] + + # First resolvent used in `_galois_group_degree_4_root_approx()`: + F41 = X[0]*X[2] + X[1]*X[3] + s41 = [ + Permutation(3), + Permutation(3)(0, 1), + Permutation(3)(0, 3) + ] + + R5, X5 = xring("X0,X1,X2,X3,X4", ZZ, lex) + X = X5 + + # First resolvent used in `_galois_group_degree_5_hybrid()`, + # and only one used in `_galois_group_degree_5_lookup_ext_factor()`: + F51 = ( X[0]**2*(X[1]*X[4] + X[2]*X[3]) + + X[1]**2*(X[2]*X[0] + X[3]*X[4]) + + X[2]**2*(X[3]*X[1] + X[4]*X[0]) + + X[3]**2*(X[4]*X[2] + X[0]*X[1]) + + X[4]**2*(X[0]*X[3] + X[1]*X[2])) + s51 = [ + Permutation(4), + Permutation(4)(0, 1), + Permutation(4)(0, 2), + Permutation(4)(0, 3), + Permutation(4)(0, 4), + Permutation(4)(1, 4) + ] + + R6, X6 = xring("X0,X1,X2,X3,X4,X5", ZZ, lex) + X = X6 + + # First resolvent used in `_galois_group_degree_6_lookup()`: + H = PGL2F5() + term0 = X[0]**2*X[5]**2*(X[1]*X[4] + X[2]*X[3]) + terms = {term0.compose(list(zip(X, s(X)))) for s in H.elements} + F61 = sum(terms) + s61 = [Permutation(5)] + [Permutation(5)(0, n) for n in range(1, 6)] + + # Second resolvent used in `_galois_group_degree_6_lookup()`: + F62 = X[0]*X[1]*X[2] + X[3]*X[4]*X[5] + s62 = [Permutation(5)] + [ + Permutation(5)(i, j + 3) for i in range(3) for j in range(3) + ] + + return { + (4, 0): (F40, X4, s40), + (4, 1): (F41, X4, s41), + (5, 1): (F51, X5, s51), + (6, 1): (F61, X6, s61), + (6, 2): (F62, X6, s62), + } + + +def generate_lambda_lookup(verbose=False, trial_run=False): + """ + Generate the whole lookup table of coeff lambdas, for all resolvents. + """ + jobs = define_resolvents() + lambda_lists = {} + total_time = 0 + time_for_61 = 0 + time_for_61_last = 0 + for k, (F, X, s) in jobs.items(): + symmetrized, times = sparse_symmetrize_resolvent_coeffs(F, X, s, verbose=verbose) + + total_time += sum(times) + if k == (6, 1): + time_for_61 = sum(times) + time_for_61_last = times[-1] + + sv = s_vars(len(X)) + head = f'lambda {", ".join(str(v) for v in sv)}:' + lambda_lists[k] = ',\n '.join([ + f'{head} ({wrap(f)})' + for f in symmetrized + ]) + + if trial_run: + break + + table = ( + "# This table was generated by a call to\n" + "# `sympy.polys.numberfields.galois_resolvents.generate_lambda_lookup()`.\n" + f"# The entire job took {total_time:.2f}s.\n" + f"# Of this, Case (6, 1) took {time_for_61:.2f}s.\n" + f"# The final polynomial of Case (6, 1) alone took {time_for_61_last:.2f}s.\n" + "resolvent_coeff_lambdas = {\n") + + for k, L in lambda_lists.items(): + table += f" {k}: [\n" + table += " " + L + '\n' + table += " ],\n" + table += "}\n" + return table + + +def get_resolvent_by_lookup(T, number): + """ + Use the lookup table, to return a resolvent (as dup) for a given + polynomial *T*. + + Parameters + ========== + + T : Poly + The polynomial whose resolvent is needed + + number : int + For some degrees, there are multiple resolvents. + Use this to indicate which one you want. + + Returns + ======= + + dup + + """ + from sympy.polys.numberfields.resolvent_lookup import resolvent_coeff_lambdas + degree = T.degree() + L = resolvent_coeff_lambdas[(degree, number)] + T_coeffs = T.rep.to_list()[1:] + return [ZZ(1)] + [c(*T_coeffs) for c in L] + + +# Use +# (.venv) $ python -m sympy.polys.numberfields.galois_resolvents +# to reproduce the table found in resolvent_lookup.py +if __name__ == "__main__": + import sys + verbose = '-v' in sys.argv[1:] + trial_run = '-t' in sys.argv[1:] + table = generate_lambda_lookup(verbose=verbose, trial_run=trial_run) + print(table) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galoisgroups.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galoisgroups.py new file mode 100644 index 0000000000000000000000000000000000000000..a0e424bf7554c0cedd926902e7322b9640735a8b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/galoisgroups.py @@ -0,0 +1,623 @@ +""" +Compute Galois groups of polynomials. + +We use algorithms from [1], with some modifications to use lookup tables for +resolvents. + +References +========== + +.. [1] Cohen, H. *A Course in Computational Algebraic Number Theory*. + +""" + +from collections import defaultdict +import random + +from sympy.core.symbol import Dummy, symbols +from sympy.ntheory.primetest import is_square +from sympy.polys.domains import ZZ +from sympy.polys.densebasic import dup_random +from sympy.polys.densetools import dup_eval +from sympy.polys.euclidtools import dup_discriminant +from sympy.polys.factortools import dup_factor_list, dup_irreducible_p +from sympy.polys.numberfields.galois_resolvents import ( + GaloisGroupException, get_resolvent_by_lookup, define_resolvents, + Resolvent, +) +from sympy.polys.numberfields.utilities import coeff_search +from sympy.polys.polytools import (Poly, poly_from_expr, + PolificationFailed, ComputationFailed) +from sympy.polys.sqfreetools import dup_sqf_p +from sympy.utilities import public + + +class MaxTriesException(GaloisGroupException): + ... + + +def tschirnhausen_transformation(T, max_coeff=10, max_tries=30, history=None, + fixed_order=True): + r""" + Given a univariate, monic, irreducible polynomial over the integers, find + another such polynomial defining the same number field. + + Explanation + =========== + + See Alg 6.3.4 of [1]. + + Parameters + ========== + + T : Poly + The given polynomial + max_coeff : int + When choosing a transformation as part of the process, + keep the coeffs between plus and minus this. + max_tries : int + Consider at most this many transformations. + history : set, None, optional (default=None) + Pass a set of ``Poly.rep``'s in order to prevent any of these + polynomials from being returned as the polynomial ``U`` i.e. the + transformation of the given polynomial *T*. The given poly *T* will + automatically be added to this set, before we try to find a new one. + fixed_order : bool, default True + If ``True``, work through candidate transformations A(x) in a fixed + order, from small coeffs to large, resulting in deterministic behavior. + If ``False``, the A(x) are chosen randomly, while still working our way + up from small coefficients to larger ones. + + Returns + ======= + + Pair ``(A, U)`` + + ``A`` and ``U`` are ``Poly``, ``A`` is the + transformation, and ``U`` is the transformed polynomial that defines + the same number field as *T*. The polynomial ``A`` maps the roots of + *T* to the roots of ``U``. + + Raises + ====== + + MaxTriesException + if could not find a polynomial before exceeding *max_tries*. + + """ + X = Dummy('X') + n = T.degree() + if history is None: + history = set() + history.add(T.rep) + + if fixed_order: + coeff_generators = {} + deg_coeff_sum = 3 + current_degree = 2 + + def get_coeff_generator(degree): + gen = coeff_generators.get(degree, coeff_search(degree, 1)) + coeff_generators[degree] = gen + return gen + + for i in range(max_tries): + + # We never use linear A(x), since applying a fixed linear transformation + # to all roots will only multiply the discriminant of T by a square + # integer. This will change nothing important. In particular, if disc(T) + # was zero before, it will still be zero now, and typically we apply + # the transformation in hopes of replacing T by a squarefree poly. + + if fixed_order: + # If d is degree and c max coeff, we move through the dc-space + # along lines of constant sum. First d + c = 3 with (d, c) = (2, 1). + # Then d + c = 4 with (d, c) = (3, 1), (2, 2). Then d + c = 5 with + # (d, c) = (4, 1), (3, 2), (2, 3), and so forth. For a given (d, c) + # we go though all sets of coeffs where max = c, before moving on. + gen = get_coeff_generator(current_degree) + coeffs = next(gen) + m = max(abs(c) for c in coeffs) + if current_degree + m > deg_coeff_sum: + if current_degree == 2: + deg_coeff_sum += 1 + current_degree = deg_coeff_sum - 1 + else: + current_degree -= 1 + gen = get_coeff_generator(current_degree) + coeffs = next(gen) + a = [ZZ(1)] + [ZZ(c) for c in coeffs] + + else: + # We use a progressive coeff bound, up to the max specified, since it + # is preferable to succeed with smaller coeffs. + # Give each coeff bound five tries, before incrementing. + C = min(i//5 + 1, max_coeff) + d = random.randint(2, n - 1) + a = dup_random(d, -C, C, ZZ) + + A = Poly(a, T.gen) + U = Poly(T.resultant(X - A), X) + if U.rep not in history and dup_sqf_p(U.rep.to_list(), ZZ): + return A, U + raise MaxTriesException + + +def has_square_disc(T): + """Convenience to check if a Poly or dup has square discriminant. """ + d = T.discriminant() if isinstance(T, Poly) else dup_discriminant(T, ZZ) + return is_square(d) + + +def _galois_group_degree_3(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 3. + + Explanation + =========== + + Uses Prop 6.3.5 of [1]. + + """ + from sympy.combinatorics.galois import S3TransitiveSubgroups + return ((S3TransitiveSubgroups.A3, True) if has_square_disc(T) + else (S3TransitiveSubgroups.S3, False)) + + +def _galois_group_degree_4_root_approx(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 4. + + Explanation + =========== + + Follows Alg 6.3.7 of [1], using a pure root approximation approach. + + """ + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.galois import S4TransitiveSubgroups + + X = symbols('X0 X1 X2 X3') + # We start by considering the resolvent for the form + # F = X0*X2 + X1*X3 + # and the group G = S4. In this case, the stabilizer H is D4 = < (0123), (02) >, + # and a set of representatives of G/H is {I, (01), (03)} + F1 = X[0]*X[2] + X[1]*X[3] + s1 = [ + Permutation(3), + Permutation(3)(0, 1), + Permutation(3)(0, 3) + ] + R1 = Resolvent(F1, X, s1) + + # In the second half of the algorithm (if we reach it), we use another + # form and set of coset representatives. However, we may need to permute + # them first, so cannot form their resolvent now. + F2_pre = X[0]*X[1]**2 + X[1]*X[2]**2 + X[2]*X[3]**2 + X[3]*X[0]**2 + s2_pre = [ + Permutation(3), + Permutation(3)(0, 2) + ] + + history = set() + for i in range(max_tries): + if i > 0: + # If we're retrying, need a new polynomial T. + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + + R_dup, _, i0 = R1.eval_for_poly(T, find_integer_root=True) + # If R is not squarefree, must retry. + if not dup_sqf_p(R_dup, ZZ): + continue + + # By Prop 6.3.1 of [1], Gal(T) is contained in A4 iff disc(T) is square. + sq_disc = has_square_disc(T) + + if i0 is None: + # By Thm 6.3.3 of [1], Gal(T) is not conjugate to any subgroup of the + # stabilizer H = D4 that we chose. This means Gal(T) is either A4 or S4. + return ((S4TransitiveSubgroups.A4, True) if sq_disc + else (S4TransitiveSubgroups.S4, False)) + + # Gal(T) is conjugate to a subgroup of H = D4, so it is either V, C4 + # or D4 itself. + + if sq_disc: + # Neither C4 nor D4 is contained in A4, so Gal(T) must be V. + return (S4TransitiveSubgroups.V, True) + + # Gal(T) can only be D4 or C4. + # We will now use our second resolvent, with G being that conjugate of D4 that + # Gal(T) is contained in. To determine the right conjugate, we will need + # the permutation corresponding to the integer root we found. + sigma = s1[i0] + # Applying sigma means permuting the args of F, and + # conjugating the set of coset representatives. + F2 = F2_pre.subs(zip(X, sigma(X)), simultaneous=True) + s2 = [sigma*tau*sigma for tau in s2_pre] + R2 = Resolvent(F2, X, s2) + R_dup, _, _ = R2.eval_for_poly(T) + d = dup_discriminant(R_dup, ZZ) + # If d is zero (R has a repeated root), must retry. + if d == 0: + continue + if is_square(d): + return (S4TransitiveSubgroups.C4, False) + else: + return (S4TransitiveSubgroups.D4, False) + + raise MaxTriesException + + +def _galois_group_degree_4_lookup(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 4. + + Explanation + =========== + + Based on Alg 6.3.6 of [1], but uses resolvent coeff lookup. + + """ + from sympy.combinatorics.galois import S4TransitiveSubgroups + + history = set() + for i in range(max_tries): + R_dup = get_resolvent_by_lookup(T, 0) + if dup_sqf_p(R_dup, ZZ): + break + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + else: + raise MaxTriesException + + # Compute list L of degrees of irreducible factors of R, in increasing order: + fl = dup_factor_list(R_dup, ZZ) + L = sorted(sum([ + [len(r) - 1] * e for r, e in fl[1] + ], [])) + + if L == [6]: + return ((S4TransitiveSubgroups.A4, True) if has_square_disc(T) + else (S4TransitiveSubgroups.S4, False)) + + if L == [1, 1, 4]: + return (S4TransitiveSubgroups.C4, False) + + if L == [2, 2, 2]: + return (S4TransitiveSubgroups.V, True) + + assert L == [2, 4] + return (S4TransitiveSubgroups.D4, False) + + +def _galois_group_degree_5_hybrid(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 5. + + Explanation + =========== + + Based on Alg 6.3.9 of [1], but uses a hybrid approach, combining resolvent + coeff lookup, with root approximation. + + """ + from sympy.combinatorics.galois import S5TransitiveSubgroups + from sympy.combinatorics.permutations import Permutation + + X5 = symbols("X0,X1,X2,X3,X4") + res = define_resolvents() + F51, _, s51 = res[(5, 1)] + F51 = F51.as_expr(*X5) + R51 = Resolvent(F51, X5, s51) + + history = set() + reached_second_stage = False + for i in range(max_tries): + if i > 0: + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + R51_dup = get_resolvent_by_lookup(T, 1) + if not dup_sqf_p(R51_dup, ZZ): + continue + + # First stage + # If we have not yet reached the second stage, then the group still + # might be S5, A5, or M20, so must test for that. + if not reached_second_stage: + sq_disc = has_square_disc(T) + + if dup_irreducible_p(R51_dup, ZZ): + return ((S5TransitiveSubgroups.A5, True) if sq_disc + else (S5TransitiveSubgroups.S5, False)) + + if not sq_disc: + return (S5TransitiveSubgroups.M20, False) + + # Second stage + reached_second_stage = True + # R51 must have an integer root for T. + # To choose our second resolvent, we need to know which conjugate of + # F51 is a root. + rounded_roots = R51.round_roots_to_integers_for_poly(T) + # These are integers, and candidates to be roots of R51. + # We find the first one that actually is a root. + for permutation_index, candidate_root in rounded_roots.items(): + if not dup_eval(R51_dup, candidate_root, ZZ): + break + + X = X5 + F2_pre = X[0]*X[1]**2 + X[1]*X[2]**2 + X[2]*X[3]**2 + X[3]*X[4]**2 + X[4]*X[0]**2 + s2_pre = [ + Permutation(4), + Permutation(4)(0, 1)(2, 4) + ] + + i0 = permutation_index + sigma = s51[i0] + F2 = F2_pre.subs(zip(X, sigma(X)), simultaneous=True) + s2 = [sigma*tau*sigma for tau in s2_pre] + R2 = Resolvent(F2, X, s2) + R_dup, _, _ = R2.eval_for_poly(T) + d = dup_discriminant(R_dup, ZZ) + + if d == 0: + continue + if is_square(d): + return (S5TransitiveSubgroups.C5, True) + else: + return (S5TransitiveSubgroups.D5, True) + + raise MaxTriesException + + +def _galois_group_degree_5_lookup_ext_factor(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 5. + + Explanation + =========== + + Based on Alg 6.3.9 of [1], but uses resolvent coeff lookup, plus + factorization over an algebraic extension. + + """ + from sympy.combinatorics.galois import S5TransitiveSubgroups + + _T = T + + history = set() + for i in range(max_tries): + R_dup = get_resolvent_by_lookup(T, 1) + if dup_sqf_p(R_dup, ZZ): + break + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + else: + raise MaxTriesException + + sq_disc = has_square_disc(T) + + if dup_irreducible_p(R_dup, ZZ): + return ((S5TransitiveSubgroups.A5, True) if sq_disc + else (S5TransitiveSubgroups.S5, False)) + + if not sq_disc: + return (S5TransitiveSubgroups.M20, False) + + # If we get this far, Gal(T) can only be D5 or C5. + # But for Gal(T) to have order 5, T must already split completely in + # the extension field obtained by adjoining a single one of its roots. + fl = Poly(_T, domain=ZZ.alg_field_from_poly(_T)).factor_list()[1] + if len(fl) == 5: + return (S5TransitiveSubgroups.C5, True) + else: + return (S5TransitiveSubgroups.D5, True) + + +def _galois_group_degree_6_lookup(T, max_tries=30, randomize=False): + r""" + Compute the Galois group of a polynomial of degree 6. + + Explanation + =========== + + Based on Alg 6.3.10 of [1], but uses resolvent coeff lookup. + + """ + from sympy.combinatorics.galois import S6TransitiveSubgroups + + # First resolvent: + + history = set() + for i in range(max_tries): + R_dup = get_resolvent_by_lookup(T, 1) + if dup_sqf_p(R_dup, ZZ): + break + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + else: + raise MaxTriesException + + fl = dup_factor_list(R_dup, ZZ) + + # Group the factors by degree. + factors_by_deg = defaultdict(list) + for r, _ in fl[1]: + factors_by_deg[len(r) - 1].append(r) + + L = sorted(sum([ + [d] * len(ff) for d, ff in factors_by_deg.items() + ], [])) + + T_has_sq_disc = has_square_disc(T) + + if L == [1, 2, 3]: + f1 = factors_by_deg[3][0] + return ((S6TransitiveSubgroups.C6, False) if has_square_disc(f1) + else (S6TransitiveSubgroups.D6, False)) + + elif L == [3, 3]: + f1, f2 = factors_by_deg[3] + any_square = has_square_disc(f1) or has_square_disc(f2) + return ((S6TransitiveSubgroups.G18, False) if any_square + else (S6TransitiveSubgroups.G36m, False)) + + elif L == [2, 4]: + if T_has_sq_disc: + return (S6TransitiveSubgroups.S4p, True) + else: + f1 = factors_by_deg[4][0] + return ((S6TransitiveSubgroups.A4xC2, False) if has_square_disc(f1) + else (S6TransitiveSubgroups.S4xC2, False)) + + elif L == [1, 1, 4]: + return ((S6TransitiveSubgroups.A4, True) if T_has_sq_disc + else (S6TransitiveSubgroups.S4m, False)) + + elif L == [1, 5]: + return ((S6TransitiveSubgroups.PSL2F5, True) if T_has_sq_disc + else (S6TransitiveSubgroups.PGL2F5, False)) + + elif L == [1, 1, 1, 3]: + return (S6TransitiveSubgroups.S3, False) + + assert L == [6] + + # Second resolvent: + + history = set() + for i in range(max_tries): + R_dup = get_resolvent_by_lookup(T, 2) + if dup_sqf_p(R_dup, ZZ): + break + _, T = tschirnhausen_transformation(T, max_tries=max_tries, + history=history, + fixed_order=not randomize) + else: + raise MaxTriesException + + T_has_sq_disc = has_square_disc(T) + + if dup_irreducible_p(R_dup, ZZ): + return ((S6TransitiveSubgroups.A6, True) if T_has_sq_disc + else (S6TransitiveSubgroups.S6, False)) + else: + return ((S6TransitiveSubgroups.G36p, True) if T_has_sq_disc + else (S6TransitiveSubgroups.G72, False)) + + +@public +def galois_group(f, *gens, by_name=False, max_tries=30, randomize=False, **args): + r""" + Compute the Galois group for polynomials *f* up to degree 6. + + Examples + ======== + + >>> from sympy import galois_group + >>> from sympy.abc import x + >>> f = x**4 + 1 + >>> G, alt = galois_group(f) + >>> print(G) + PermutationGroup([ + (0 1)(2 3), + (0 2)(1 3)]) + + The group is returned along with a boolean, indicating whether it is + contained in the alternating group $A_n$, where $n$ is the degree of *T*. + Along with other group properties, this can help determine which group it + is: + + >>> alt + True + >>> G.order() + 4 + + Alternatively, the group can be returned by name: + + >>> G_name, _ = galois_group(f, by_name=True) + >>> print(G_name) + S4TransitiveSubgroups.V + + The group itself can then be obtained by calling the name's + ``get_perm_group()`` method: + + >>> G_name.get_perm_group() + PermutationGroup([ + (0 1)(2 3), + (0 2)(1 3)]) + + Group names are values of the enum classes + :py:class:`sympy.combinatorics.galois.S1TransitiveSubgroups`, + :py:class:`sympy.combinatorics.galois.S2TransitiveSubgroups`, + etc. + + Parameters + ========== + + f : Expr + Irreducible polynomial over :ref:`ZZ` or :ref:`QQ`, whose Galois group + is to be determined. + gens : optional list of symbols + For converting *f* to Poly, and will be passed on to the + :py:func:`~.poly_from_expr` function. + by_name : bool, default False + If ``True``, the Galois group will be returned by name. + Otherwise it will be returned as a :py:class:`~.PermutationGroup`. + max_tries : int, default 30 + Make at most this many attempts in those steps that involve + generating Tschirnhausen transformations. + randomize : bool, default False + If ``True``, then use random coefficients when generating Tschirnhausen + transformations. Otherwise try transformations in a fixed order. Both + approaches start with small coefficients and degrees and work upward. + args : optional + For converting *f* to Poly, and will be passed on to the + :py:func:`~.poly_from_expr` function. + + Returns + ======= + + Pair ``(G, alt)`` + The first element ``G`` indicates the Galois group. It is an instance + of one of the :py:class:`sympy.combinatorics.galois.S1TransitiveSubgroups` + :py:class:`sympy.combinatorics.galois.S2TransitiveSubgroups`, etc. enum + classes if *by_name* was ``True``, and a :py:class:`~.PermutationGroup` + if ``False``. + + The second element is a boolean, saying whether the group is contained + in the alternating group $A_n$ ($n$ the degree of *T*). + + Raises + ====== + + ValueError + if *f* is of an unsupported degree. + + MaxTriesException + if could not complete before exceeding *max_tries* in those steps + that involve generating Tschirnhausen transformations. + + See Also + ======== + + .Poly.galois_group + + """ + gens = gens or [] + args = args or {} + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('galois_group', 1, exc) + + return F.galois_group(by_name=by_name, max_tries=max_tries, + randomize=randomize) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/minpoly.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/minpoly.py new file mode 100644 index 0000000000000000000000000000000000000000..e5f556e6f82a9790aa7c421fc14ac0fb637b7b49 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/minpoly.py @@ -0,0 +1,882 @@ +"""Minimal polynomials for algebraic numbers.""" + +from functools import reduce + +from sympy.core.add import Add +from sympy.core.exprtools import Factors +from sympy.core.function import expand_mul, expand_multinomial, _mexpand +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, pi, _illegal) +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify +from sympy.core.traversal import preorder_traversal +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt, cbrt +from sympy.functions.elementary.trigonometric import cos, sin, tan +from sympy.ntheory.factor_ import divisors +from sympy.utilities.iterables import subsets + +from sympy.polys.domains import ZZ, QQ, FractionField +from sympy.polys.orthopolys import dup_chebyshevt +from sympy.polys.polyerrors import ( + NotAlgebraic, + GeneratorsError, +) +from sympy.polys.polytools import ( + Poly, PurePoly, invert, factor_list, groebner, resultant, + degree, poly_from_expr, parallel_poly_from_expr, lcm +) +from sympy.polys.polyutils import dict_from_expr, expr_from_dict +from sympy.polys.ring_series import rs_compose_add +from sympy.polys.rings import ring +from sympy.polys.rootoftools import CRootOf +from sympy.polys.specialpolys import cyclotomic_poly +from sympy.utilities import ( + numbered_symbols, public, sift +) + + +def _choose_factor(factors, x, v, dom=QQ, prec=200, bound=5): + """ + Return a factor having root ``v`` + It is assumed that one of the factors has root ``v``. + """ + + if isinstance(factors[0], tuple): + factors = [f[0] for f in factors] + if len(factors) == 1: + return factors[0] + + prec1 = 10 + points = {} + symbols = dom.symbols if hasattr(dom, 'symbols') else [] + while prec1 <= prec: + # when dealing with non-Rational numbers we usually evaluate + # with `subs` argument but we only need a ballpark evaluation + fe = [f.as_expr().xreplace({x:v}) for f in factors] + if v.is_number: + fe = [f.n(prec) for f in fe] + + # assign integers [0, n) to symbols (if any) + for n in subsets(range(bound), k=len(symbols), repetition=True): + for s, i in zip(symbols, n): + points[s] = i + + # evaluate the expression at these points + candidates = [(abs(f.subs(points).n(prec1)), i) + for i,f in enumerate(fe)] + + # if we get invalid numbers (e.g. from division by zero) + # we try again + if any(i in _illegal for i, _ in candidates): + continue + + # find the smallest two -- if they differ significantly + # then we assume we have found the factor that becomes + # 0 when v is substituted into it + can = sorted(candidates) + (a, ix), (b, _) = can[:2] + if b > a * 10**6: # XXX what to use? + return factors[ix] + + prec1 *= 2 + + raise NotImplementedError("multiple candidates for the minimal polynomial of %s" % v) + + +def _is_sum_surds(p): + return all(f.is_Rational or f.is_Pow and + f.base.is_Rational and (2*f.exp).is_Integer and f.is_extended_real + for t in Add.make_args(p) for f in Mul.make_args(t)) + + +def _separate_sq(p): + """ + helper function for ``_minimal_polynomial_sq`` + + It selects a rational ``g`` such that the polynomial ``p`` + consists of a sum of terms whose surds squared have gcd equal to ``g`` + and a sum of terms with surds squared prime with ``g``; + then it takes the field norm to eliminate ``sqrt(g)`` + + See simplify.simplify.split_surds and polytools.sqf_norm. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import x + >>> from sympy.polys.numberfields.minpoly import _separate_sq + >>> p= -x + sqrt(2) + sqrt(3) + sqrt(7) + >>> p = _separate_sq(p); p + -x**2 + 2*sqrt(3)*x + 2*sqrt(7)*x - 2*sqrt(21) - 8 + >>> p = _separate_sq(p); p + -x**4 + 4*sqrt(7)*x**3 - 32*x**2 + 8*sqrt(7)*x + 20 + >>> p = _separate_sq(p); p + -x**8 + 48*x**6 - 536*x**4 + 1728*x**2 - 400 + + """ + def is_sqrt(expr): + return expr.is_Pow and expr.exp is S.Half + # p = c1*sqrt(q1) + ... + cn*sqrt(qn) -> a = [(c1, q1), .., (cn, qn)] + a = [] + for y in p.args: + if not y.is_Mul: + if is_sqrt(y): + a.append((S.One, y**2)) + elif y.is_Atom: + a.append((y, S.One)) + elif y.is_Pow and y.exp.is_integer: + a.append((y, S.One)) + else: + raise NotImplementedError + else: + T, F = sift(y.args, is_sqrt, binary=True) + a.append((Mul(*F), Mul(*T)**2)) + a.sort(key=lambda z: z[1]) + if a[-1][1] is S.One: + # there are no surds + return p + surds = [z for y, z in a] + for i in range(len(surds)): + if surds[i] != 1: + break + from sympy.simplify.radsimp import _split_gcd + g, b1, b2 = _split_gcd(*surds[i:]) + a1 = [] + a2 = [] + for y, z in a: + if z in b1: + a1.append(y*z**S.Half) + else: + a2.append(y*z**S.Half) + p1 = Add(*a1) + p2 = Add(*a2) + p = _mexpand(p1**2) - _mexpand(p2**2) + return p + +def _minimal_polynomial_sq(p, n, x): + """ + Returns the minimal polynomial for the ``nth-root`` of a sum of surds + or ``None`` if it fails. + + Parameters + ========== + + p : sum of surds + n : positive integer + x : variable of the returned polynomial + + Examples + ======== + + >>> from sympy.polys.numberfields.minpoly import _minimal_polynomial_sq + >>> from sympy import sqrt + >>> from sympy.abc import x + >>> q = 1 + sqrt(2) + sqrt(3) + >>> _minimal_polynomial_sq(q, 3, x) + x**12 - 4*x**9 - 4*x**6 + 16*x**3 - 8 + + """ + p = sympify(p) + n = sympify(n) + if not n.is_Integer or not n > 0 or not _is_sum_surds(p): + return None + pn = p**Rational(1, n) + # eliminate the square roots + p -= x + while 1: + p1 = _separate_sq(p) + if p1 is p: + p = p1.subs({x:x**n}) + break + else: + p = p1 + + # _separate_sq eliminates field extensions in a minimal way, so that + # if n = 1 then `p = constant*(minimal_polynomial(p))` + # if n > 1 it contains the minimal polynomial as a factor. + if n == 1: + p1 = Poly(p) + if p.coeff(x**p1.degree(x)) < 0: + p = -p + p = p.primitive()[1] + return p + # by construction `p` has root `pn` + # the minimal polynomial is the factor vanishing in x = pn + factors = factor_list(p)[1] + + result = _choose_factor(factors, x, pn) + return result + +def _minpoly_op_algebraic_element(op, ex1, ex2, x, dom, mp1=None, mp2=None): + """ + return the minimal polynomial for ``op(ex1, ex2)`` + + Parameters + ========== + + op : operation ``Add`` or ``Mul`` + ex1, ex2 : expressions for the algebraic elements + x : indeterminate of the polynomials + dom: ground domain + mp1, mp2 : minimal polynomials for ``ex1`` and ``ex2`` or None + + Examples + ======== + + >>> from sympy import sqrt, Add, Mul, QQ + >>> from sympy.polys.numberfields.minpoly import _minpoly_op_algebraic_element + >>> from sympy.abc import x, y + >>> p1 = sqrt(sqrt(2) + 1) + >>> p2 = sqrt(sqrt(2) - 1) + >>> _minpoly_op_algebraic_element(Mul, p1, p2, x, QQ) + x - 1 + >>> q1 = sqrt(y) + >>> q2 = 1 / y + >>> _minpoly_op_algebraic_element(Add, q1, q2, x, QQ.frac_field(y)) + x**2*y**2 - 2*x*y - y**3 + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Resultant + .. [2] I.M. Isaacs, Proc. Amer. Math. Soc. 25 (1970), 638 + "Degrees of sums in a separable field extension". + + """ + y = Dummy(str(x)) + if mp1 is None: + mp1 = _minpoly_compose(ex1, x, dom) + if mp2 is None: + mp2 = _minpoly_compose(ex2, y, dom) + else: + mp2 = mp2.subs({x: y}) + + if op is Add: + # mp1a = mp1.subs({x: x - y}) + if dom == QQ: + R, X = ring('X', QQ) + p1 = R(dict_from_expr(mp1)[0]) + p2 = R(dict_from_expr(mp2)[0]) + else: + (p1, p2), _ = parallel_poly_from_expr((mp1, x - y), x, y) + r = p1.compose(p2) + mp1a = r.as_expr() + + elif op is Mul: + mp1a = _muly(mp1, x, y) + else: + raise NotImplementedError('option not available') + + if op is Mul or dom != QQ: + r = resultant(mp1a, mp2, gens=[y, x]) + else: + r = rs_compose_add(p1, p2) + r = expr_from_dict(r.as_expr_dict(), x) + + deg1 = degree(mp1, x) + deg2 = degree(mp2, y) + if op is Mul and deg1 == 1 or deg2 == 1: + # if deg1 = 1, then mp1 = x - a; mp1a = x - y - a; + # r = mp2(x - a), so that `r` is irreducible + return r + + r = Poly(r, x, domain=dom) + _, factors = r.factor_list() + res = _choose_factor(factors, x, op(ex1, ex2), dom) + return res.as_expr() + + +def _invertx(p, x): + """ + Returns ``expand_mul(x**degree(p, x)*p.subs(x, 1/x))`` + """ + p1 = poly_from_expr(p, x)[0] + + n = degree(p1) + a = [c * x**(n - i) for (i,), c in p1.terms()] + return Add(*a) + + +def _muly(p, x, y): + """ + Returns ``_mexpand(y**deg*p.subs({x:x / y}))`` + """ + p1 = poly_from_expr(p, x)[0] + + n = degree(p1) + a = [c * x**i * y**(n - i) for (i,), c in p1.terms()] + return Add(*a) + + +def _minpoly_pow(ex, pw, x, dom, mp=None): + """ + Returns ``minpoly(ex**pw, x)`` + + Parameters + ========== + + ex : algebraic element + pw : rational number + x : indeterminate of the polynomial + dom: ground domain + mp : minimal polynomial of ``p`` + + Examples + ======== + + >>> from sympy import sqrt, QQ, Rational + >>> from sympy.polys.numberfields.minpoly import _minpoly_pow, minpoly + >>> from sympy.abc import x, y + >>> p = sqrt(1 + sqrt(2)) + >>> _minpoly_pow(p, 2, x, QQ) + x**2 - 2*x - 1 + >>> minpoly(p**2, x) + x**2 - 2*x - 1 + >>> _minpoly_pow(y, Rational(1, 3), x, QQ.frac_field(y)) + x**3 - y + >>> minpoly(y**Rational(1, 3), x) + x**3 - y + + """ + pw = sympify(pw) + if not mp: + mp = _minpoly_compose(ex, x, dom) + if not pw.is_rational: + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + if pw < 0: + if mp == x: + raise ZeroDivisionError('%s is zero' % ex) + mp = _invertx(mp, x) + if pw == -1: + return mp + pw = -pw + ex = 1/ex + + y = Dummy(str(x)) + mp = mp.subs({x: y}) + n, d = pw.as_numer_denom() + res = Poly(resultant(mp, x**d - y**n, gens=[y]), x, domain=dom) + _, factors = res.factor_list() + res = _choose_factor(factors, x, ex**pw, dom) + return res.as_expr() + + +def _minpoly_add(x, dom, *a): + """ + returns ``minpoly(Add(*a), dom, x)`` + """ + mp = _minpoly_op_algebraic_element(Add, a[0], a[1], x, dom) + p = a[0] + a[1] + for px in a[2:]: + mp = _minpoly_op_algebraic_element(Add, p, px, x, dom, mp1=mp) + p = p + px + return mp + + +def _minpoly_mul(x, dom, *a): + """ + returns ``minpoly(Mul(*a), dom, x)`` + """ + mp = _minpoly_op_algebraic_element(Mul, a[0], a[1], x, dom) + p = a[0] * a[1] + for px in a[2:]: + mp = _minpoly_op_algebraic_element(Mul, p, px, x, dom, mp1=mp) + p = p * px + return mp + + +def _minpoly_sin(ex, x): + """ + Returns the minimal polynomial of ``sin(ex)`` + see https://mathworld.wolfram.com/TrigonometryAngles.html + """ + c, a = ex.args[0].as_coeff_Mul() + if a is pi: + if c.is_rational: + n = c.q + q = sympify(n) + if q.is_prime: + # for a = pi*p/q with q odd prime, using chebyshevt + # write sin(q*a) = mp(sin(a))*sin(a); + # the roots of mp(x) are sin(pi*p/q) for p = 1,..., q - 1 + a = dup_chebyshevt(n, ZZ) + return Add(*[x**(n - i - 1)*a[i] for i in range(n)]) + if c.p == 1: + if q == 9: + return 64*x**6 - 96*x**4 + 36*x**2 - 3 + + if n % 2 == 1: + # for a = pi*p/q with q odd, use + # sin(q*a) = 0 to see that the minimal polynomial must be + # a factor of dup_chebyshevt(n, ZZ) + a = dup_chebyshevt(n, ZZ) + a = [x**(n - i)*a[i] for i in range(n + 1)] + r = Add(*a) + _, factors = factor_list(r) + res = _choose_factor(factors, x, ex) + return res + + expr = ((1 - cos(2*c*pi))/2)**S.Half + res = _minpoly_compose(expr, x, QQ) + return res + + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + + +def _minpoly_cos(ex, x): + """ + Returns the minimal polynomial of ``cos(ex)`` + see https://mathworld.wolfram.com/TrigonometryAngles.html + """ + c, a = ex.args[0].as_coeff_Mul() + if a is pi: + if c.is_rational: + if c.p == 1: + if c.q == 7: + return 8*x**3 - 4*x**2 - 4*x + 1 + if c.q == 9: + return 8*x**3 - 6*x - 1 + elif c.p == 2: + q = sympify(c.q) + if q.is_prime: + s = _minpoly_sin(ex, x) + return _mexpand(s.subs({x:sqrt((1 - x)/2)})) + + # for a = pi*p/q, cos(q*a) =T_q(cos(a)) = (-1)**p + n = int(c.q) + a = dup_chebyshevt(n, ZZ) + a = [x**(n - i)*a[i] for i in range(n + 1)] + r = Add(*a) - (-1)**c.p + _, factors = factor_list(r) + res = _choose_factor(factors, x, ex) + return res + + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + + +def _minpoly_tan(ex, x): + """ + Returns the minimal polynomial of ``tan(ex)`` + see https://github.com/sympy/sympy/issues/21430 + """ + c, a = ex.args[0].as_coeff_Mul() + if a is pi: + if c.is_rational: + c = c * 2 + n = int(c.q) + a = n if c.p % 2 == 0 else 1 + terms = [] + for k in range((c.p+1)%2, n+1, 2): + terms.append(a*x**k) + a = -(a*(n-k-1)*(n-k)) // ((k+1)*(k+2)) + + r = Add(*terms) + _, factors = factor_list(r) + res = _choose_factor(factors, x, ex) + return res + + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + + +def _minpoly_exp(ex, x): + """ + Returns the minimal polynomial of ``exp(ex)`` + """ + c, a = ex.args[0].as_coeff_Mul() + if a == I*pi: + if c.is_rational: + q = sympify(c.q) + if c.p == 1 or c.p == -1: + if q == 3: + return x**2 - x + 1 + if q == 4: + return x**4 + 1 + if q == 6: + return x**4 - x**2 + 1 + if q == 8: + return x**8 + 1 + if q == 9: + return x**6 - x**3 + 1 + if q == 10: + return x**8 - x**6 + x**4 - x**2 + 1 + if q.is_prime: + s = 0 + for i in range(q): + s += (-x)**i + return s + + # x**(2*q) = product(factors) + factors = [cyclotomic_poly(i, x) for i in divisors(2*q)] + mp = _choose_factor(factors, x, ex) + return mp + else: + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + + +def _minpoly_rootof(ex, x): + """ + Returns the minimal polynomial of a ``CRootOf`` object. + """ + p = ex.expr + p = p.subs({ex.poly.gens[0]:x}) + _, factors = factor_list(p, x) + result = _choose_factor(factors, x, ex) + return result + + +def _minpoly_compose(ex, x, dom): + """ + Computes the minimal polynomial of an algebraic element + using operations on minimal polynomials + + Examples + ======== + + >>> from sympy import minimal_polynomial, sqrt, Rational + >>> from sympy.abc import x, y + >>> minimal_polynomial(sqrt(2) + 3*Rational(1, 3), x, compose=True) + x**2 - 2*x - 1 + >>> minimal_polynomial(sqrt(y) + 1/y, x, compose=True) + x**2*y**2 - 2*x*y - y**3 + 1 + + """ + if ex.is_Rational: + return ex.q*x - ex.p + if ex is I: + _, factors = factor_list(x**2 + 1, x, domain=dom) + return x**2 + 1 if len(factors) == 1 else x - I + + if ex is S.GoldenRatio: + _, factors = factor_list(x**2 - x - 1, x, domain=dom) + if len(factors) == 1: + return x**2 - x - 1 + else: + return _choose_factor(factors, x, (1 + sqrt(5))/2, dom=dom) + + if ex is S.TribonacciConstant: + _, factors = factor_list(x**3 - x**2 - x - 1, x, domain=dom) + if len(factors) == 1: + return x**3 - x**2 - x - 1 + else: + fac = (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + return _choose_factor(factors, x, fac, dom=dom) + + if hasattr(dom, 'symbols') and ex in dom.symbols: + return x - ex + + if dom.is_QQ and _is_sum_surds(ex): + # eliminate the square roots + v = ex + ex -= x + while 1: + ex1 = _separate_sq(ex) + if ex1 is ex: + return _choose_factor(factor_list(ex)[1], x, v) + else: + ex = ex1 + + if ex.is_Add: + res = _minpoly_add(x, dom, *ex.args) + elif ex.is_Mul: + f = Factors(ex).factors + r = sift(f.items(), lambda itx: itx[0].is_Rational and itx[1].is_Rational) + if r[True] and dom == QQ: + ex1 = Mul(*[bx**ex for bx, ex in r[False] + r[None]]) + r1 = dict(r[True]) + dens = [y.q for y in r1.values()] + lcmdens = reduce(lcm, dens, 1) + neg1 = S.NegativeOne + expn1 = r1.pop(neg1, S.Zero) + nums = [base**(y.p*lcmdens // y.q) for base, y in r1.items()] + ex2 = Mul(*nums) + mp1 = minimal_polynomial(ex1, x) + # use the fact that in SymPy canonicalization products of integers + # raised to rational powers are organized in relatively prime + # bases, and that in ``base**(n/d)`` a perfect power is + # simplified with the root + # Powers of -1 have to be treated separately to preserve sign. + mp2 = ex2.q*x**lcmdens - ex2.p*neg1**(expn1*lcmdens) + ex2 = neg1**expn1 * ex2**Rational(1, lcmdens) + res = _minpoly_op_algebraic_element(Mul, ex1, ex2, x, dom, mp1=mp1, mp2=mp2) + else: + res = _minpoly_mul(x, dom, *ex.args) + elif ex.is_Pow: + res = _minpoly_pow(ex.base, ex.exp, x, dom) + elif ex.__class__ is sin: + res = _minpoly_sin(ex, x) + elif ex.__class__ is cos: + res = _minpoly_cos(ex, x) + elif ex.__class__ is tan: + res = _minpoly_tan(ex, x) + elif ex.__class__ is exp: + res = _minpoly_exp(ex, x) + elif ex.__class__ is CRootOf: + res = _minpoly_rootof(ex, x) + else: + raise NotAlgebraic("%s does not seem to be an algebraic element" % ex) + return res + + +@public +def minimal_polynomial(ex, x=None, compose=True, polys=False, domain=None): + """ + Computes the minimal polynomial of an algebraic element. + + Parameters + ========== + + ex : Expr + Element or expression whose minimal polynomial is to be calculated. + + x : Symbol, optional + Independent variable of the minimal polynomial + + compose : boolean, optional (default=True) + Method to use for computing minimal polynomial. If ``compose=True`` + (default) then ``_minpoly_compose`` is used, if ``compose=False`` then + groebner bases are used. + + polys : boolean, optional (default=False) + If ``True`` returns a ``Poly`` object else an ``Expr`` object. + + domain : Domain, optional + Ground domain + + Notes + ===== + + By default ``compose=True``, the minimal polynomial of the subexpressions of ``ex`` + are computed, then the arithmetic operations on them are performed using the resultant + and factorization. + If ``compose=False``, a bottom-up algorithm is used with ``groebner``. + The default algorithm stalls less frequently. + + If no ground domain is given, it will be generated automatically from the expression. + + Examples + ======== + + >>> from sympy import minimal_polynomial, sqrt, solve, QQ + >>> from sympy.abc import x, y + + >>> minimal_polynomial(sqrt(2), x) + x**2 - 2 + >>> minimal_polynomial(sqrt(2), x, domain=QQ.algebraic_field(sqrt(2))) + x - sqrt(2) + >>> minimal_polynomial(sqrt(2) + sqrt(3), x) + x**4 - 10*x**2 + 1 + >>> minimal_polynomial(solve(x**3 + x + 3)[0], x) + x**3 + x + 3 + >>> minimal_polynomial(sqrt(y), x) + x**2 - y + + """ + + ex = sympify(ex) + if ex.is_number: + # not sure if it's always needed but try it for numbers (issue 8354) + ex = _mexpand(ex, recursive=True) + for expr in preorder_traversal(ex): + if expr.is_AlgebraicNumber: + compose = False + break + + if x is not None: + x, cls = sympify(x), Poly + else: + x, cls = Dummy('x'), PurePoly + + if not domain: + if ex.free_symbols: + domain = FractionField(QQ, list(ex.free_symbols)) + else: + domain = QQ + if hasattr(domain, 'symbols') and x in domain.symbols: + raise GeneratorsError("the variable %s is an element of the ground " + "domain %s" % (x, domain)) + + if compose: + result = _minpoly_compose(ex, x, domain) + result = result.primitive()[1] + c = result.coeff(x**degree(result, x)) + if c.is_negative: + result = expand_mul(-result) + return cls(result, x, field=True) if polys else result.collect(x) + + if not domain.is_QQ: + raise NotImplementedError("groebner method only works for QQ") + + result = _minpoly_groebner(ex, x, cls) + return cls(result, x, field=True) if polys else result.collect(x) + + +def _minpoly_groebner(ex, x, cls): + """ + Computes the minimal polynomial of an algebraic number + using Groebner bases + + Examples + ======== + + >>> from sympy import minimal_polynomial, sqrt, Rational + >>> from sympy.abc import x + >>> minimal_polynomial(sqrt(2) + 3*Rational(1, 3), x, compose=False) + x**2 - 2*x - 1 + + """ + + generator = numbered_symbols('a', cls=Dummy) + mapping, symbols = {}, {} + + def update_mapping(ex, exp, base=None): + a = next(generator) + symbols[ex] = a + + if base is not None: + mapping[ex] = a**exp + base + else: + mapping[ex] = exp.as_expr(a) + + return a + + def bottom_up_scan(ex): + """ + Transform a given algebraic expression *ex* into a multivariate + polynomial, by introducing fresh variables with defining equations. + + Explanation + =========== + + The critical elements of the algebraic expression *ex* are root + extractions, instances of :py:class:`~.AlgebraicNumber`, and negative + powers. + + When we encounter a root extraction or an :py:class:`~.AlgebraicNumber` + we replace this expression with a fresh variable ``a_i``, and record + the defining polynomial for ``a_i``. For example, if ``a_0**(1/3)`` + occurs, we will replace it with ``a_1``, and record the new defining + polynomial ``a_1**3 - a_0``. + + When we encounter a negative power we transform it into a positive + power by algebraically inverting the base. This means computing the + minimal polynomial in ``x`` for the base, inverting ``x`` modulo this + poly (which generates a new polynomial) and then substituting the + original base expression for ``x`` in this last polynomial. + + We return the transformed expression, and we record the defining + equations for new symbols using the ``update_mapping()`` function. + + """ + if ex.is_Atom: + if ex is S.ImaginaryUnit: + if ex not in mapping: + return update_mapping(ex, 2, 1) + else: + return symbols[ex] + elif ex.is_Rational: + return ex + elif ex.is_Add: + return Add(*[ bottom_up_scan(g) for g in ex.args ]) + elif ex.is_Mul: + return Mul(*[ bottom_up_scan(g) for g in ex.args ]) + elif ex.is_Pow: + if ex.exp.is_Rational: + if ex.exp < 0: + minpoly_base = _minpoly_groebner(ex.base, x, cls) + inverse = invert(x, minpoly_base).as_expr() + base_inv = inverse.subs(x, ex.base).expand() + + if ex.exp == -1: + return bottom_up_scan(base_inv) + else: + ex = base_inv**(-ex.exp) + if not ex.exp.is_Integer: + base, exp = ( + ex.base**ex.exp.p).expand(), Rational(1, ex.exp.q) + else: + base, exp = ex.base, ex.exp + base = bottom_up_scan(base) + expr = base**exp + + if expr not in mapping: + if exp.is_Integer: + return expr.expand() + else: + return update_mapping(expr, 1 / exp, -base) + else: + return symbols[expr] + elif ex.is_AlgebraicNumber: + if ex not in mapping: + return update_mapping(ex, ex.minpoly_of_element()) + else: + return symbols[ex] + + raise NotAlgebraic("%s does not seem to be an algebraic number" % ex) + + def simpler_inverse(ex): + """ + Returns True if it is more likely that the minimal polynomial + algorithm works better with the inverse + """ + if ex.is_Pow: + if (1/ex.exp).is_integer and ex.exp < 0: + if ex.base.is_Add: + return True + if ex.is_Mul: + hit = True + for p in ex.args: + if p.is_Add: + return False + if p.is_Pow: + if p.base.is_Add and p.exp > 0: + return False + + if hit: + return True + return False + + inverted = False + ex = expand_multinomial(ex) + if ex.is_AlgebraicNumber: + return ex.minpoly_of_element().as_expr(x) + elif ex.is_Rational: + result = ex.q*x - ex.p + else: + inverted = simpler_inverse(ex) + if inverted: + ex = ex**-1 + res = None + if ex.is_Pow and (1/ex.exp).is_Integer: + n = 1/ex.exp + res = _minimal_polynomial_sq(ex.base, n, x) + + elif _is_sum_surds(ex): + res = _minimal_polynomial_sq(ex, S.One, x) + + if res is not None: + result = res + + if res is None: + bus = bottom_up_scan(ex) + F = [x - bus] + list(mapping.values()) + G = groebner(F, list(symbols.values()) + [x], order='lex') + + _, factors = factor_list(G[-1]) + # by construction G[-1] has root `ex` + result = _choose_factor(factors, x, ex) + if inverted: + result = _invertx(result, x) + if result.coeff(x**degree(result, x)) < 0: + result = expand_mul(-result) + + return result + + +@public +def minpoly(ex, x=None, compose=True, polys=False, domain=None): + """This is a synonym for :py:func:`~.minimal_polynomial`.""" + return minimal_polynomial(ex, x=x, compose=compose, polys=polys, domain=domain) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/modules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/modules.py new file mode 100644 index 0000000000000000000000000000000000000000..af2e29bcc9cf73d97def0701712f90db58601b86 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/modules.py @@ -0,0 +1,2114 @@ +r"""Modules in number fields. + +The classes defined here allow us to work with finitely generated, free +modules, whose generators are algebraic numbers. + +There is an abstract base class called :py:class:`~.Module`, which has two +concrete subclasses, :py:class:`~.PowerBasis` and :py:class:`~.Submodule`. + +Every module is defined by its basis, or set of generators: + +* For a :py:class:`~.PowerBasis`, the generators are the first $n$ powers + (starting with the zeroth) of an algebraic integer $\theta$ of degree $n$. + The :py:class:`~.PowerBasis` is constructed by passing either the minimal + polynomial of $\theta$, or an :py:class:`~.AlgebraicField` having $\theta$ + as its primitive element. + +* For a :py:class:`~.Submodule`, the generators are a set of + $\mathbb{Q}$-linear combinations of the generators of another module. That + other module is then the "parent" of the :py:class:`~.Submodule`. The + coefficients of the $\mathbb{Q}$-linear combinations may be given by an + integer matrix, and a positive integer denominator. Each column of the matrix + defines a generator. + +>>> from sympy.polys import Poly, cyclotomic_poly, ZZ +>>> from sympy.abc import x +>>> from sympy.polys.matrices import DomainMatrix, DM +>>> from sympy.polys.numberfields.modules import PowerBasis +>>> T = Poly(cyclotomic_poly(5, x)) +>>> A = PowerBasis(T) +>>> print(A) +PowerBasis(x**4 + x**3 + x**2 + x + 1) +>>> B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ), denom=3) +>>> print(B) +Submodule[[2, 0, 0, 0], [0, 2, 0, 0], [0, 0, 2, 0], [0, 0, 0, 2]]/3 +>>> print(B.parent) +PowerBasis(x**4 + x**3 + x**2 + x + 1) + +Thus, every module is either a :py:class:`~.PowerBasis`, +or a :py:class:`~.Submodule`, some ancestor of which is a +:py:class:`~.PowerBasis`. (If ``S`` is a :py:class:`~.Submodule`, then its +ancestors are ``S.parent``, ``S.parent.parent``, and so on). + +The :py:class:`~.ModuleElement` class represents a linear combination of the +generators of any module. Critically, the coefficients of this linear +combination are not restricted to be integers, but may be any rational +numbers. This is necessary so that any and all algebraic integers be +representable, starting from the power basis in a primitive element $\theta$ +for the number field in question. For example, in a quadratic field +$\mathbb{Q}(\sqrt{d})$ where $d \equiv 1 \mod{4}$, a denominator of $2$ is +needed. + +A :py:class:`~.ModuleElement` can be constructed from an integer column vector +and a denominator: + +>>> U = Poly(x**2 - 5) +>>> M = PowerBasis(U) +>>> e = M(DM([[1], [1]], ZZ), denom=2) +>>> print(e) +[1, 1]/2 +>>> print(e.module) +PowerBasis(x**2 - 5) + +The :py:class:`~.PowerBasisElement` class is a subclass of +:py:class:`~.ModuleElement` that represents elements of a +:py:class:`~.PowerBasis`, and adds functionality pertinent to elements +represented directly over powers of the primitive element $\theta$. + + +Arithmetic with module elements +=============================== + +While a :py:class:`~.ModuleElement` represents a linear combination over the +generators of a particular module, recall that every module is either a +:py:class:`~.PowerBasis` or a descendant (along a chain of +:py:class:`~.Submodule` objects) thereof, so that in fact every +:py:class:`~.ModuleElement` represents an algebraic number in some field +$\mathbb{Q}(\theta)$, where $\theta$ is the defining element of some +:py:class:`~.PowerBasis`. It thus makes sense to talk about the number field +to which a given :py:class:`~.ModuleElement` belongs. + +This means that any two :py:class:`~.ModuleElement` instances can be added, +subtracted, multiplied, or divided, provided they belong to the same number +field. Similarly, since $\mathbb{Q}$ is a subfield of every number field, +any :py:class:`~.ModuleElement` may be added, multiplied, etc. by any +rational number. + +>>> from sympy import QQ +>>> from sympy.polys.numberfields.modules import to_col +>>> T = Poly(cyclotomic_poly(5)) +>>> A = PowerBasis(T) +>>> C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) +>>> e = A(to_col([0, 2, 0, 0]), denom=3) +>>> f = A(to_col([0, 0, 0, 7]), denom=5) +>>> g = C(to_col([1, 1, 1, 1])) +>>> e + f +[0, 10, 0, 21]/15 +>>> e - f +[0, 10, 0, -21]/15 +>>> e - g +[-9, -7, -9, -9]/3 +>>> e + QQ(7, 10) +[21, 20, 0, 0]/30 +>>> e * f +[-14, -14, -14, -14]/15 +>>> e ** 2 +[0, 0, 4, 0]/9 +>>> f // g +[7, 7, 7, 7]/15 +>>> f * QQ(2, 3) +[0, 0, 0, 14]/15 + +However, care must be taken with arithmetic operations on +:py:class:`~.ModuleElement`, because the module $C$ to which the result will +belong will be the nearest common ancestor (NCA) of the modules $A$, $B$ to +which the two operands belong, and $C$ may be different from either or both +of $A$ and $B$. + +>>> A = PowerBasis(T) +>>> B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) +>>> C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) +>>> print((B(0) * C(0)).module == A) +True + +Before the arithmetic operation is performed, copies of the two operands are +automatically converted into elements of the NCA (the operands themselves are +not modified). This upward conversion along an ancestor chain is easy: it just +requires the successive multiplication by the defining matrix of each +:py:class:`~.Submodule`. + +Conversely, downward conversion, i.e. representing a given +:py:class:`~.ModuleElement` in a submodule, is also supported -- namely by +the :py:meth:`~sympy.polys.numberfields.modules.Submodule.represent` method +-- but is not guaranteed to succeed in general, since the given element may +not belong to the submodule. The main circumstance in which this issue tends +to arise is with multiplication, since modules, while closed under addition, +need not be closed under multiplication. + + +Multiplication +-------------- + +Generally speaking, a module need not be closed under multiplication, i.e. need +not form a ring. However, many of the modules we work with in the context of +number fields are in fact rings, and our classes do support multiplication. + +Specifically, any :py:class:`~.Module` can attempt to compute its own +multiplication table, but this does not happen unless an attempt is made to +multiply two :py:class:`~.ModuleElement` instances belonging to it. + +>>> A = PowerBasis(T) +>>> print(A._mult_tab is None) +True +>>> a = A(0)*A(1) +>>> print(A._mult_tab is None) +False + +Every :py:class:`~.PowerBasis` is, by its nature, closed under multiplication, +so instances of :py:class:`~.PowerBasis` can always successfully compute their +multiplication table. + +When a :py:class:`~.Submodule` attempts to compute its multiplication table, +it converts each of its own generators into elements of its parent module, +multiplies them there, in every possible pairing, and then tries to +represent the results in itself, i.e. as $\mathbb{Z}$-linear combinations +over its own generators. This will succeed if and only if the submodule is +in fact closed under multiplication. + + +Module Homomorphisms +==================== + +Many important number theoretic algorithms require the calculation of the +kernel of one or more module homomorphisms. Accordingly we have several +lightweight classes, :py:class:`~.ModuleHomomorphism`, +:py:class:`~.ModuleEndomorphism`, :py:class:`~.InnerEndomorphism`, and +:py:class:`~.EndomorphismRing`, which provide the minimal necessary machinery +to support this. + +""" + +from sympy.core.intfunc import igcd, ilcm +from sympy.core.symbol import Dummy +from sympy.polys.polyclasses import ANP +from sympy.polys.polytools import Poly +from sympy.polys.densetools import dup_clear_denoms +from sympy.polys.domains.algebraicfield import AlgebraicField +from sympy.polys.domains.finitefield import FF +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.domains.integerring import ZZ +from sympy.polys.matrices.domainmatrix import DomainMatrix +from sympy.polys.matrices.exceptions import DMBadInputError +from sympy.polys.matrices.normalforms import hermite_normal_form +from sympy.polys.polyerrors import CoercionFailed, UnificationFailed +from sympy.polys.polyutils import IntegerPowerable +from .exceptions import ClosureFailure, MissingUnityError, StructureError +from .utilities import AlgIntPowers, is_rat, get_num_denom + + +def to_col(coeffs): + r"""Transform a list of integer coefficients into a column vector.""" + return DomainMatrix([[ZZ(c) for c in coeffs]], (1, len(coeffs)), ZZ).transpose() + + +class Module: + """ + Generic finitely-generated module. + + This is an abstract base class, and should not be instantiated directly. + The two concrete subclasses are :py:class:`~.PowerBasis` and + :py:class:`~.Submodule`. + + Every :py:class:`~.Submodule` is derived from another module, referenced + by its ``parent`` attribute. If ``S`` is a submodule, then we refer to + ``S.parent``, ``S.parent.parent``, and so on, as the "ancestors" of + ``S``. Thus, every :py:class:`~.Module` is either a + :py:class:`~.PowerBasis` or a :py:class:`~.Submodule`, some ancestor of + which is a :py:class:`~.PowerBasis`. + """ + + @property + def n(self): + """The number of generators of this module.""" + raise NotImplementedError + + def mult_tab(self): + """ + Get the multiplication table for this module (if closed under mult). + + Explanation + =========== + + Computes a dictionary ``M`` of dictionaries of lists, representing the + upper triangular half of the multiplication table. + + In other words, if ``0 <= i <= j < self.n``, then ``M[i][j]`` is the + list ``c`` of coefficients such that + ``g[i] * g[j] == sum(c[k]*g[k], k in range(self.n))``, + where ``g`` is the list of generators of this module. + + If ``j < i`` then ``M[i][j]`` is undefined. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> print(A.mult_tab()) # doctest: +SKIP + {0: {0: [1, 0, 0, 0], 1: [0, 1, 0, 0], 2: [0, 0, 1, 0], 3: [0, 0, 0, 1]}, + 1: {1: [0, 0, 1, 0], 2: [0, 0, 0, 1], 3: [-1, -1, -1, -1]}, + 2: {2: [-1, -1, -1, -1], 3: [1, 0, 0, 0]}, + 3: {3: [0, 1, 0, 0]}} + + Returns + ======= + + dict of dict of lists + + Raises + ====== + + ClosureFailure + If the module is not closed under multiplication. + + """ + raise NotImplementedError + + @property + def parent(self): + """ + The parent module, if any, for this module. + + Explanation + =========== + + For a :py:class:`~.Submodule` this is its ``parent`` attribute; for a + :py:class:`~.PowerBasis` this is ``None``. + + Returns + ======= + + :py:class:`~.Module`, ``None`` + + See Also + ======== + + Module + + """ + return None + + def represent(self, elt): + r""" + Represent a module element as an integer-linear combination over the + generators of this module. + + Explanation + =========== + + In our system, to "represent" always means to write a + :py:class:`~.ModuleElement` as a :ref:`ZZ`-linear combination over the + generators of the present :py:class:`~.Module`. Furthermore, the + incoming :py:class:`~.ModuleElement` must belong to an ancestor of + the present :py:class:`~.Module` (or to the present + :py:class:`~.Module` itself). + + The most common application is to represent a + :py:class:`~.ModuleElement` in a :py:class:`~.Submodule`. For example, + this is involved in computing multiplication tables. + + On the other hand, representing in a :py:class:`~.PowerBasis` is an + odd case, and one which tends not to arise in practice, except for + example when using a :py:class:`~.ModuleEndomorphism` on a + :py:class:`~.PowerBasis`. + + In such a case, (1) the incoming :py:class:`~.ModuleElement` must + belong to the :py:class:`~.PowerBasis` itself (since the latter has no + proper ancestors) and (2) it is "representable" iff it belongs to + $\mathbb{Z}[\theta]$ (although generally a + :py:class:`~.PowerBasisElement` may represent any element of + $\mathbb{Q}(\theta)$, i.e. any algebraic number). + + Examples + ======== + + >>> from sympy import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis, to_col + >>> from sympy.abc import zeta + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> a = A(to_col([2, 4, 6, 8])) + + The :py:class:`~.ModuleElement` ``a`` has all even coefficients. + If we represent ``a`` in the submodule ``B = 2*A``, the coefficients in + the column vector will be halved: + + >>> B = A.submodule_from_gens([2*A(i) for i in range(4)]) + >>> b = B.represent(a) + >>> print(b.transpose()) # doctest: +SKIP + DomainMatrix([[1, 2, 3, 4]], (1, 4), ZZ) + + However, the element of ``B`` so defined still represents the same + algebraic number: + + >>> print(a.poly(zeta).as_expr()) + 8*zeta**3 + 6*zeta**2 + 4*zeta + 2 + >>> print(B(b).over_power_basis().poly(zeta).as_expr()) + 8*zeta**3 + 6*zeta**2 + 4*zeta + 2 + + Parameters + ========== + + elt : :py:class:`~.ModuleElement` + The module element to be represented. Must belong to some ancestor + module of this module (including this module itself). + + Returns + ======= + + :py:class:`~.DomainMatrix` over :ref:`ZZ` + This will be a column vector, representing the coefficients of a + linear combination of this module's generators, which equals the + given element. + + Raises + ====== + + ClosureFailure + If the given element cannot be represented as a :ref:`ZZ`-linear + combination over this module. + + See Also + ======== + + .Submodule.represent + .PowerBasis.represent + + """ + raise NotImplementedError + + def ancestors(self, include_self=False): + """ + Return the list of ancestor modules of this module, from the + foundational :py:class:`~.PowerBasis` downward, optionally including + ``self``. + + See Also + ======== + + Module + + """ + c = self.parent + a = [] if c is None else c.ancestors(include_self=True) + if include_self: + a.append(self) + return a + + def power_basis_ancestor(self): + """ + Return the :py:class:`~.PowerBasis` that is an ancestor of this module. + + See Also + ======== + + Module + + """ + if isinstance(self, PowerBasis): + return self + c = self.parent + if c is not None: + return c.power_basis_ancestor() + return None + + def nearest_common_ancestor(self, other): + """ + Locate the nearest common ancestor of this module and another. + + Returns + ======= + + :py:class:`~.Module`, ``None`` + + See Also + ======== + + Module + + """ + sA = self.ancestors(include_self=True) + oA = other.ancestors(include_self=True) + nca = None + for sa, oa in zip(sA, oA): + if sa == oa: + nca = sa + else: + break + return nca + + @property + def number_field(self): + r""" + Return the associated :py:class:`~.AlgebraicField`, if any. + + Explanation + =========== + + A :py:class:`~.PowerBasis` can be constructed on a :py:class:`~.Poly` + $f$ or on an :py:class:`~.AlgebraicField` $K$. In the latter case, the + :py:class:`~.PowerBasis` and all its descendant modules will return $K$ + as their ``.number_field`` property, while in the former case they will + all return ``None``. + + Returns + ======= + + :py:class:`~.AlgebraicField`, ``None`` + + """ + return self.power_basis_ancestor().number_field + + def is_compat_col(self, col): + """Say whether *col* is a suitable column vector for this module.""" + return isinstance(col, DomainMatrix) and col.shape == (self.n, 1) and col.domain.is_ZZ + + def __call__(self, spec, denom=1): + r""" + Generate a :py:class:`~.ModuleElement` belonging to this module. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis, to_col + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> e = A(to_col([1, 2, 3, 4]), denom=3) + >>> print(e) # doctest: +SKIP + [1, 2, 3, 4]/3 + >>> f = A(2) + >>> print(f) # doctest: +SKIP + [0, 0, 1, 0] + + Parameters + ========== + + spec : :py:class:`~.DomainMatrix`, int + Specifies the numerators of the coefficients of the + :py:class:`~.ModuleElement`. Can be either a column vector over + :ref:`ZZ`, whose length must equal the number $n$ of generators of + this module, or else an integer ``j``, $0 \leq j < n$, which is a + shorthand for column $j$ of $I_n$, the $n \times n$ identity + matrix. + denom : int, optional (default=1) + Denominator for the coefficients of the + :py:class:`~.ModuleElement`. + + Returns + ======= + + :py:class:`~.ModuleElement` + The coefficients are the entries of the *spec* vector, divided by + *denom*. + + """ + if isinstance(spec, int) and 0 <= spec < self.n: + spec = DomainMatrix.eye(self.n, ZZ)[:, spec].to_dense() + if not self.is_compat_col(spec): + raise ValueError('Compatible column vector required.') + return make_mod_elt(self, spec, denom=denom) + + def starts_with_unity(self): + """Say whether the module's first generator equals unity.""" + raise NotImplementedError + + def basis_elements(self): + """ + Get list of :py:class:`~.ModuleElement` being the generators of this + module. + """ + return [self(j) for j in range(self.n)] + + def zero(self): + """Return a :py:class:`~.ModuleElement` representing zero.""" + return self(0) * 0 + + def one(self): + """ + Return a :py:class:`~.ModuleElement` representing unity, + and belonging to the first ancestor of this module (including + itself) that starts with unity. + """ + return self.element_from_rational(1) + + def element_from_rational(self, a): + """ + Return a :py:class:`~.ModuleElement` representing a rational number. + + Explanation + =========== + + The returned :py:class:`~.ModuleElement` will belong to the first + module on this module's ancestor chain (including this module + itself) that starts with unity. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly, QQ + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> a = A.element_from_rational(QQ(2, 3)) + >>> print(a) # doctest: +SKIP + [2, 0, 0, 0]/3 + + Parameters + ========== + + a : int, :ref:`ZZ`, :ref:`QQ` + + Returns + ======= + + :py:class:`~.ModuleElement` + + """ + raise NotImplementedError + + def submodule_from_gens(self, gens, hnf=True, hnf_modulus=None): + """ + Form the submodule generated by a list of :py:class:`~.ModuleElement` + belonging to this module. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> gens = [A(0), 2*A(1), 3*A(2), 4*A(3)//5] + >>> B = A.submodule_from_gens(gens) + >>> print(B) # doctest: +SKIP + Submodule[[5, 0, 0, 0], [0, 10, 0, 0], [0, 0, 15, 0], [0, 0, 0, 4]]/5 + + Parameters + ========== + + gens : list of :py:class:`~.ModuleElement` belonging to this module. + hnf : boolean, optional (default=True) + If True, we will reduce the matrix into Hermite Normal Form before + forming the :py:class:`~.Submodule`. + hnf_modulus : int, None, optional (default=None) + Modulus for use in the HNF reduction algorithm. See + :py:func:`~sympy.polys.matrices.normalforms.hermite_normal_form`. + + Returns + ======= + + :py:class:`~.Submodule` + + See Also + ======== + + submodule_from_matrix + + """ + if not all(g.module == self for g in gens): + raise ValueError('Generators must belong to this module.') + n = len(gens) + if n == 0: + raise ValueError('Need at least one generator.') + m = gens[0].n + d = gens[0].denom if n == 1 else ilcm(*[g.denom for g in gens]) + B = DomainMatrix.zeros((m, 0), ZZ).hstack(*[(d // g.denom) * g.col for g in gens]) + if hnf: + B = hermite_normal_form(B, D=hnf_modulus) + return self.submodule_from_matrix(B, denom=d) + + def submodule_from_matrix(self, B, denom=1): + """ + Form the submodule generated by the elements of this module indicated + by the columns of a matrix, with an optional denominator. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly, ZZ + >>> from sympy.polys.matrices import DM + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> B = A.submodule_from_matrix(DM([ + ... [0, 10, 0, 0], + ... [0, 0, 7, 0], + ... ], ZZ).transpose(), denom=15) + >>> print(B) # doctest: +SKIP + Submodule[[0, 10, 0, 0], [0, 0, 7, 0]]/15 + + Parameters + ========== + + B : :py:class:`~.DomainMatrix` over :ref:`ZZ` + Each column gives the numerators of the coefficients of one + generator of the submodule. Thus, the number of rows of *B* must + equal the number of generators of the present module. + denom : int, optional (default=1) + Common denominator for all generators of the submodule. + + Returns + ======= + + :py:class:`~.Submodule` + + Raises + ====== + + ValueError + If the given matrix *B* is not over :ref:`ZZ` or its number of rows + does not equal the number of generators of the present module. + + See Also + ======== + + submodule_from_gens + + """ + m, n = B.shape + if not B.domain.is_ZZ: + raise ValueError('Matrix must be over ZZ.') + if not m == self.n: + raise ValueError('Matrix row count must match base module.') + return Submodule(self, B, denom=denom) + + def whole_submodule(self): + """ + Return a submodule equal to this entire module. + + Explanation + =========== + + This is useful when you have a :py:class:`~.PowerBasis` and want to + turn it into a :py:class:`~.Submodule` (in order to use methods + belonging to the latter). + + """ + B = DomainMatrix.eye(self.n, ZZ) + return self.submodule_from_matrix(B) + + def endomorphism_ring(self): + """Form the :py:class:`~.EndomorphismRing` for this module.""" + return EndomorphismRing(self) + + +class PowerBasis(Module): + """The module generated by the powers of an algebraic integer.""" + + def __init__(self, T): + """ + Parameters + ========== + + T : :py:class:`~.Poly`, :py:class:`~.AlgebraicField` + Either (1) the monic, irreducible, univariate polynomial over + :ref:`ZZ`, a root of which is the generator of the power basis, + or (2) an :py:class:`~.AlgebraicField` whose primitive element + is the generator of the power basis. + + """ + K = None + if isinstance(T, AlgebraicField): + K, T = T, T.ext.minpoly_of_element() + # Sometimes incoming Polys are formally over QQ, although all their + # coeffs are integral. We want them to be formally over ZZ. + T = T.set_domain(ZZ) + self.K = K + self.T = T + self._n = T.degree() + self._mult_tab = None + + @property + def number_field(self): + return self.K + + def __repr__(self): + return f'PowerBasis({self.T.as_expr()})' + + def __eq__(self, other): + if isinstance(other, PowerBasis): + return self.T == other.T + return NotImplemented + + @property + def n(self): + return self._n + + def mult_tab(self): + if self._mult_tab is None: + self.compute_mult_tab() + return self._mult_tab + + def compute_mult_tab(self): + theta_pow = AlgIntPowers(self.T) + M = {} + n = self.n + for u in range(n): + M[u] = {} + for v in range(u, n): + M[u][v] = theta_pow[u + v] + self._mult_tab = M + + def represent(self, elt): + r""" + Represent a module element as an integer-linear combination over the + generators of this module. + + See Also + ======== + + .Module.represent + .Submodule.represent + + """ + if elt.module == self and elt.denom == 1: + return elt.column() + else: + raise ClosureFailure('Element not representable in ZZ[theta].') + + def starts_with_unity(self): + return True + + def element_from_rational(self, a): + return self(0) * a + + def element_from_poly(self, f): + """ + Produce an element of this module, representing *f* after reduction mod + our defining minimal polynomial. + + Parameters + ========== + + f : :py:class:`~.Poly` over :ref:`ZZ` in same var as our defining poly. + + Returns + ======= + + :py:class:`~.PowerBasisElement` + + """ + n, k = self.n, f.degree() + if k >= n: + f = f % self.T + if f == 0: + return self.zero() + d, c = dup_clear_denoms(f.rep.to_list(), QQ, convert=True) + c = list(reversed(c)) + ell = len(c) + z = [ZZ(0)] * (n - ell) + col = to_col(c + z) + return self(col, denom=d) + + def _element_from_rep_and_mod(self, rep, mod): + """ + Produce a PowerBasisElement representing a given algebraic number. + + Parameters + ========== + + rep : list of coeffs + Represents the number as polynomial in the primitive element of the + field. + + mod : list of coeffs + Represents the minimal polynomial of the primitive element of the + field. + + Returns + ======= + + :py:class:`~.PowerBasisElement` + + """ + if mod != self.T.rep.to_list(): + raise UnificationFailed('Element does not appear to be in the same field.') + return self.element_from_poly(Poly(rep, self.T.gen)) + + def element_from_ANP(self, a): + """Convert an ANP into a PowerBasisElement. """ + return self._element_from_rep_and_mod(a.to_list(), a.mod_to_list()) + + def element_from_alg_num(self, a): + """Convert an AlgebraicNumber into a PowerBasisElement. """ + return self._element_from_rep_and_mod(a.rep.to_list(), a.minpoly.rep.to_list()) + + +class Submodule(Module, IntegerPowerable): + """A submodule of another module.""" + + def __init__(self, parent, matrix, denom=1, mult_tab=None): + """ + Parameters + ========== + + parent : :py:class:`~.Module` + The module from which this one is derived. + matrix : :py:class:`~.DomainMatrix` over :ref:`ZZ` + The matrix whose columns define this submodule's generators as + linear combinations over the parent's generators. + denom : int, optional (default=1) + Denominator for the coefficients given by the matrix. + mult_tab : dict, ``None``, optional + If already known, the multiplication table for this module may be + supplied. + + """ + self._parent = parent + self._matrix = matrix + self._denom = denom + self._mult_tab = mult_tab + self._n = matrix.shape[1] + self._QQ_matrix = None + self._starts_with_unity = None + self._is_sq_maxrank_HNF = None + + def __repr__(self): + r = 'Submodule' + repr(self.matrix.transpose().to_Matrix().tolist()) + if self.denom > 1: + r += f'/{self.denom}' + return r + + def reduced(self): + """ + Produce a reduced version of this submodule. + + Explanation + =========== + + In the reduced version, it is guaranteed that 1 is the only positive + integer dividing both the submodule's denominator, and every entry in + the submodule's matrix. + + Returns + ======= + + :py:class:`~.Submodule` + + """ + if self.denom == 1: + return self + g = igcd(self.denom, *self.coeffs) + if g == 1: + return self + return type(self)(self.parent, (self.matrix / g).convert_to(ZZ), denom=self.denom // g, mult_tab=self._mult_tab) + + def discard_before(self, r): + """ + Produce a new module by discarding all generators before a given + index *r*. + """ + W = self.matrix[:, r:] + s = self.n - r + M = None + mt = self._mult_tab + if mt is not None: + M = {} + for u in range(s): + M[u] = {} + for v in range(u, s): + M[u][v] = mt[r + u][r + v][r:] + return Submodule(self.parent, W, denom=self.denom, mult_tab=M) + + @property + def n(self): + return self._n + + def mult_tab(self): + if self._mult_tab is None: + self.compute_mult_tab() + return self._mult_tab + + def compute_mult_tab(self): + gens = self.basis_element_pullbacks() + M = {} + n = self.n + for u in range(n): + M[u] = {} + for v in range(u, n): + M[u][v] = self.represent(gens[u] * gens[v]).flat() + self._mult_tab = M + + @property + def parent(self): + return self._parent + + @property + def matrix(self): + return self._matrix + + @property + def coeffs(self): + return self.matrix.flat() + + @property + def denom(self): + return self._denom + + @property + def QQ_matrix(self): + """ + :py:class:`~.DomainMatrix` over :ref:`QQ`, equal to + ``self.matrix / self.denom``, and guaranteed to be dense. + + Explanation + =========== + + Depending on how it is formed, a :py:class:`~.DomainMatrix` may have + an internal representation that is sparse or dense. We guarantee a + dense representation here, so that tests for equivalence of submodules + always come out as expected. + + Examples + ======== + + >>> from sympy.polys import Poly, cyclotomic_poly, ZZ + >>> from sympy.abc import x + >>> from sympy.polys.matrices import DomainMatrix + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> T = Poly(cyclotomic_poly(5, x)) + >>> A = PowerBasis(T) + >>> B = A.submodule_from_matrix(3*DomainMatrix.eye(4, ZZ), denom=6) + >>> C = A.submodule_from_matrix(DomainMatrix.eye(4, ZZ), denom=2) + >>> print(B.QQ_matrix == C.QQ_matrix) + True + + Returns + ======= + + :py:class:`~.DomainMatrix` over :ref:`QQ` + + """ + if self._QQ_matrix is None: + self._QQ_matrix = (self.matrix / self.denom).to_dense() + return self._QQ_matrix + + def starts_with_unity(self): + if self._starts_with_unity is None: + self._starts_with_unity = self(0).equiv(1) + return self._starts_with_unity + + def is_sq_maxrank_HNF(self): + if self._is_sq_maxrank_HNF is None: + self._is_sq_maxrank_HNF = is_sq_maxrank_HNF(self._matrix) + return self._is_sq_maxrank_HNF + + def is_power_basis_submodule(self): + return isinstance(self.parent, PowerBasis) + + def element_from_rational(self, a): + if self.starts_with_unity(): + return self(0) * a + else: + return self.parent.element_from_rational(a) + + def basis_element_pullbacks(self): + """ + Return list of this submodule's basis elements as elements of the + submodule's parent module. + """ + return [e.to_parent() for e in self.basis_elements()] + + def represent(self, elt): + """ + Represent a module element as an integer-linear combination over the + generators of this module. + + See Also + ======== + + .Module.represent + .PowerBasis.represent + + """ + if elt.module == self: + return elt.column() + elif elt.module == self.parent: + try: + # The given element should be a ZZ-linear combination over our + # basis vectors; however, due to the presence of denominators, + # we need to solve over QQ. + A = self.QQ_matrix + b = elt.QQ_col + x = A._solve(b)[0].transpose() + x = x.convert_to(ZZ) + except DMBadInputError: + raise ClosureFailure('Element outside QQ-span of this basis.') + except CoercionFailed: + raise ClosureFailure('Element in QQ-span but not ZZ-span of this basis.') + return x + elif isinstance(self.parent, Submodule): + coeffs_in_parent = self.parent.represent(elt) + parent_element = self.parent(coeffs_in_parent) + return self.represent(parent_element) + else: + raise ClosureFailure('Element outside ancestor chain of this module.') + + def is_compat_submodule(self, other): + return isinstance(other, Submodule) and other.parent == self.parent + + def __eq__(self, other): + if self.is_compat_submodule(other): + return other.QQ_matrix == self.QQ_matrix + return NotImplemented + + def add(self, other, hnf=True, hnf_modulus=None): + """ + Add this :py:class:`~.Submodule` to another. + + Explanation + =========== + + This represents the module generated by the union of the two modules' + sets of generators. + + Parameters + ========== + + other : :py:class:`~.Submodule` + hnf : boolean, optional (default=True) + If ``True``, reduce the matrix of the combined module to its + Hermite Normal Form. + hnf_modulus : :ref:`ZZ`, None, optional + If a positive integer is provided, use this as modulus in the + HNF reduction. See + :py:func:`~sympy.polys.matrices.normalforms.hermite_normal_form`. + + Returns + ======= + + :py:class:`~.Submodule` + + """ + d, e = self.denom, other.denom + m = ilcm(d, e) + a, b = m // d, m // e + B = (a * self.matrix).hstack(b * other.matrix) + if hnf: + B = hermite_normal_form(B, D=hnf_modulus) + return self.parent.submodule_from_matrix(B, denom=m) + + def __add__(self, other): + if self.is_compat_submodule(other): + return self.add(other) + return NotImplemented + + __radd__ = __add__ + + def mul(self, other, hnf=True, hnf_modulus=None): + """ + Multiply this :py:class:`~.Submodule` by a rational number, a + :py:class:`~.ModuleElement`, or another :py:class:`~.Submodule`. + + Explanation + =========== + + To multiply by a rational number or :py:class:`~.ModuleElement` means + to form the submodule whose generators are the products of this + quantity with all the generators of the present submodule. + + To multiply by another :py:class:`~.Submodule` means to form the + submodule whose generators are all the products of one generator from + the one submodule, and one generator from the other. + + Parameters + ========== + + other : int, :ref:`ZZ`, :ref:`QQ`, :py:class:`~.ModuleElement`, :py:class:`~.Submodule` + hnf : boolean, optional (default=True) + If ``True``, reduce the matrix of the product module to its + Hermite Normal Form. + hnf_modulus : :ref:`ZZ`, None, optional + If a positive integer is provided, use this as modulus in the + HNF reduction. See + :py:func:`~sympy.polys.matrices.normalforms.hermite_normal_form`. + + Returns + ======= + + :py:class:`~.Submodule` + + """ + if is_rat(other): + a, b = get_num_denom(other) + if a == b == 1: + return self + else: + return Submodule(self.parent, + self.matrix * a, denom=self.denom * b, + mult_tab=None).reduced() + elif isinstance(other, ModuleElement) and other.module == self.parent: + # The submodule is multiplied by an element of the parent module. + # We presume this means we want a new submodule of the parent module. + gens = [other * e for e in self.basis_element_pullbacks()] + return self.parent.submodule_from_gens(gens, hnf=hnf, hnf_modulus=hnf_modulus) + elif self.is_compat_submodule(other): + # This case usually means you're multiplying ideals, and want another + # ideal, i.e. another submodule of the same parent module. + alphas, betas = self.basis_element_pullbacks(), other.basis_element_pullbacks() + gens = [a * b for a in alphas for b in betas] + return self.parent.submodule_from_gens(gens, hnf=hnf, hnf_modulus=hnf_modulus) + return NotImplemented + + def __mul__(self, other): + return self.mul(other) + + __rmul__ = __mul__ + + def _first_power(self): + return self + + def reduce_element(self, elt): + r""" + If this submodule $B$ has defining matrix $W$ in square, maximal-rank + Hermite normal form, then, given an element $x$ of the parent module + $A$, we produce an element $y \in A$ such that $x - y \in B$, and the + $i$th coordinate of $y$ satisfies $0 \leq y_i < w_{i,i}$. This + representative $y$ is unique, in the sense that every element of + the coset $x + B$ reduces to it under this procedure. + + Explanation + =========== + + In the special case where $A$ is a power basis for a number field $K$, + and $B$ is a submodule representing an ideal $I$, this operation + represents one of a few important ways of reducing an element of $K$ + modulo $I$ to obtain a "small" representative. See [Cohen00]_ Section + 1.4.3. + + Examples + ======== + + >>> from sympy import QQ, Poly, symbols + >>> t = symbols('t') + >>> k = QQ.alg_field_from_poly(Poly(t**3 + t**2 - 2*t + 8)) + >>> Zk = k.maximal_order() + >>> A = Zk.parent + >>> B = (A(2) - 3*A(0))*Zk + >>> B.reduce_element(A(2)) + [3, 0, 0] + + Parameters + ========== + + elt : :py:class:`~.ModuleElement` + An element of this submodule's parent module. + + Returns + ======= + + elt : :py:class:`~.ModuleElement` + An element of this submodule's parent module. + + Raises + ====== + + NotImplementedError + If the given :py:class:`~.ModuleElement` does not belong to this + submodule's parent module. + StructureError + If this submodule's defining matrix is not in square, maximal-rank + Hermite normal form. + + References + ========== + + .. [Cohen00] Cohen, H. *Advanced Topics in Computational Number + Theory.* + + """ + if not elt.module == self.parent: + raise NotImplementedError + if not self.is_sq_maxrank_HNF(): + msg = "Reduction not implemented unless matrix square max-rank HNF" + raise StructureError(msg) + B = self.basis_element_pullbacks() + a = elt + for i in range(self.n - 1, -1, -1): + b = B[i] + q = a.coeffs[i]*b.denom // (b.coeffs[i]*a.denom) + a -= q*b + return a + + +def is_sq_maxrank_HNF(dm): + r""" + Say whether a :py:class:`~.DomainMatrix` is in that special case of Hermite + Normal Form, in which the matrix is also square and of maximal rank. + + Explanation + =========== + + We commonly work with :py:class:`~.Submodule` instances whose matrix is in + this form, and it can be useful to be able to check that this condition is + satisfied. + + For example this is the case with the :py:class:`~.Submodule` ``ZK`` + returned by :py:func:`~sympy.polys.numberfields.basis.round_two`, which + represents the maximal order in a number field, and with ideals formed + therefrom, such as ``2 * ZK``. + + """ + if dm.domain.is_ZZ and dm.is_square and dm.is_upper: + n = dm.shape[0] + for i in range(n): + d = dm[i, i].element + if d <= 0: + return False + for j in range(i + 1, n): + if not (0 <= dm[i, j].element < d): + return False + return True + return False + + +def make_mod_elt(module, col, denom=1): + r""" + Factory function which builds a :py:class:`~.ModuleElement`, but ensures + that it is a :py:class:`~.PowerBasisElement` if the module is a + :py:class:`~.PowerBasis`. + """ + if isinstance(module, PowerBasis): + return PowerBasisElement(module, col, denom=denom) + else: + return ModuleElement(module, col, denom=denom) + + +class ModuleElement(IntegerPowerable): + r""" + Represents an element of a :py:class:`~.Module`. + + NOTE: Should not be constructed directly. Use the + :py:meth:`~.Module.__call__` method or the :py:func:`make_mod_elt()` + factory function instead. + """ + + def __init__(self, module, col, denom=1): + """ + Parameters + ========== + + module : :py:class:`~.Module` + The module to which this element belongs. + col : :py:class:`~.DomainMatrix` over :ref:`ZZ` + Column vector giving the numerators of the coefficients of this + element. + denom : int, optional (default=1) + Denominator for the coefficients of this element. + + """ + self.module = module + self.col = col + self.denom = denom + self._QQ_col = None + + def __repr__(self): + r = str([int(c) for c in self.col.flat()]) + if self.denom > 1: + r += f'/{self.denom}' + return r + + def reduced(self): + """ + Produce a reduced version of this ModuleElement, i.e. one in which the + gcd of the denominator together with all numerator coefficients is 1. + """ + if self.denom == 1: + return self + g = igcd(self.denom, *self.coeffs) + if g == 1: + return self + return type(self)(self.module, + (self.col / g).convert_to(ZZ), + denom=self.denom // g) + + def reduced_mod_p(self, p): + """ + Produce a version of this :py:class:`~.ModuleElement` in which all + numerator coefficients have been reduced mod *p*. + """ + return make_mod_elt(self.module, + self.col.convert_to(FF(p)).convert_to(ZZ), + denom=self.denom) + + @classmethod + def from_int_list(cls, module, coeffs, denom=1): + """ + Make a :py:class:`~.ModuleElement` from a list of ints (instead of a + column vector). + """ + col = to_col(coeffs) + return cls(module, col, denom=denom) + + @property + def n(self): + """The length of this element's column.""" + return self.module.n + + def __len__(self): + return self.n + + def column(self, domain=None): + """ + Get a copy of this element's column, optionally converting to a domain. + """ + if domain is None: + return self.col.copy() + else: + return self.col.convert_to(domain) + + @property + def coeffs(self): + return self.col.flat() + + @property + def QQ_col(self): + """ + :py:class:`~.DomainMatrix` over :ref:`QQ`, equal to + ``self.col / self.denom``, and guaranteed to be dense. + + See Also + ======== + + .Submodule.QQ_matrix + + """ + if self._QQ_col is None: + self._QQ_col = (self.col / self.denom).to_dense() + return self._QQ_col + + def to_parent(self): + """ + Transform into a :py:class:`~.ModuleElement` belonging to the parent of + this element's module. + """ + if not isinstance(self.module, Submodule): + raise ValueError('Not an element of a Submodule.') + return make_mod_elt( + self.module.parent, self.module.matrix * self.col, + denom=self.module.denom * self.denom) + + def to_ancestor(self, anc): + """ + Transform into a :py:class:`~.ModuleElement` belonging to a given + ancestor of this element's module. + + Parameters + ========== + + anc : :py:class:`~.Module` + + """ + if anc == self.module: + return self + else: + return self.to_parent().to_ancestor(anc) + + def over_power_basis(self): + """ + Transform into a :py:class:`~.PowerBasisElement` over our + :py:class:`~.PowerBasis` ancestor. + """ + e = self + while not isinstance(e.module, PowerBasis): + e = e.to_parent() + return e + + def is_compat(self, other): + """ + Test whether other is another :py:class:`~.ModuleElement` with same + module. + """ + return isinstance(other, ModuleElement) and other.module == self.module + + def unify(self, other): + """ + Try to make a compatible pair of :py:class:`~.ModuleElement`, one + equivalent to this one, and one equivalent to the other. + + Explanation + =========== + + We search for the nearest common ancestor module for the pair of + elements, and represent each one there. + + Returns + ======= + + Pair ``(e1, e2)`` + Each ``ei`` is a :py:class:`~.ModuleElement`, they belong to the + same :py:class:`~.Module`, ``e1`` is equivalent to ``self``, and + ``e2`` is equivalent to ``other``. + + Raises + ====== + + UnificationFailed + If ``self`` and ``other`` have no common ancestor module. + + """ + if self.module == other.module: + return self, other + nca = self.module.nearest_common_ancestor(other.module) + if nca is not None: + return self.to_ancestor(nca), other.to_ancestor(nca) + raise UnificationFailed(f"Cannot unify {self} with {other}") + + def __eq__(self, other): + if self.is_compat(other): + return self.QQ_col == other.QQ_col + return NotImplemented + + def equiv(self, other): + """ + A :py:class:`~.ModuleElement` may test as equivalent to a rational + number or another :py:class:`~.ModuleElement`, if they represent the + same algebraic number. + + Explanation + =========== + + This method is intended to check equivalence only in those cases in + which it is easy to test; namely, when *other* is either a + :py:class:`~.ModuleElement` that can be unified with this one (i.e. one + which shares a common :py:class:`~.PowerBasis` ancestor), or else a + rational number (which is easy because every :py:class:`~.PowerBasis` + represents every rational number). + + Parameters + ========== + + other : int, :ref:`ZZ`, :ref:`QQ`, :py:class:`~.ModuleElement` + + Returns + ======= + + bool + + Raises + ====== + + UnificationFailed + If ``self`` and ``other`` do not share a common + :py:class:`~.PowerBasis` ancestor. + + """ + if self == other: + return True + elif isinstance(other, ModuleElement): + a, b = self.unify(other) + return a == b + elif is_rat(other): + if isinstance(self, PowerBasisElement): + return self == self.module(0) * other + else: + return self.over_power_basis().equiv(other) + return False + + def __add__(self, other): + """ + A :py:class:`~.ModuleElement` can be added to a rational number, or to + another :py:class:`~.ModuleElement`. + + Explanation + =========== + + When the other summand is a rational number, it will be converted into + a :py:class:`~.ModuleElement` (belonging to the first ancestor of this + module that starts with unity). + + In all cases, the sum belongs to the nearest common ancestor (NCA) of + the modules of the two summands. If the NCA does not exist, we return + ``NotImplemented``. + """ + if self.is_compat(other): + d, e = self.denom, other.denom + m = ilcm(d, e) + u, v = m // d, m // e + col = to_col([u * a + v * b for a, b in zip(self.coeffs, other.coeffs)]) + return type(self)(self.module, col, denom=m).reduced() + elif isinstance(other, ModuleElement): + try: + a, b = self.unify(other) + except UnificationFailed: + return NotImplemented + return a + b + elif is_rat(other): + return self + self.module.element_from_rational(other) + return NotImplemented + + __radd__ = __add__ + + def __neg__(self): + return self * -1 + + def __sub__(self, other): + return self + (-other) + + def __rsub__(self, other): + return -self + other + + def __mul__(self, other): + """ + A :py:class:`~.ModuleElement` can be multiplied by a rational number, + or by another :py:class:`~.ModuleElement`. + + Explanation + =========== + + When the multiplier is a rational number, the product is computed by + operating directly on the coefficients of this + :py:class:`~.ModuleElement`. + + When the multiplier is another :py:class:`~.ModuleElement`, the product + will belong to the nearest common ancestor (NCA) of the modules of the + two operands, and that NCA must have a multiplication table. If the NCA + does not exist, we return ``NotImplemented``. If the NCA does not have + a mult. table, ``ClosureFailure`` will be raised. + """ + if self.is_compat(other): + M = self.module.mult_tab() + A, B = self.col.flat(), other.col.flat() + n = self.n + C = [0] * n + for u in range(n): + for v in range(u, n): + c = A[u] * B[v] + if v > u: + c += A[v] * B[u] + if c != 0: + R = M[u][v] + for k in range(n): + C[k] += c * R[k] + d = self.denom * other.denom + return self.from_int_list(self.module, C, denom=d) + elif isinstance(other, ModuleElement): + try: + a, b = self.unify(other) + except UnificationFailed: + return NotImplemented + return a * b + elif is_rat(other): + a, b = get_num_denom(other) + if a == b == 1: + return self + else: + return make_mod_elt(self.module, + self.col * a, denom=self.denom * b).reduced() + return NotImplemented + + __rmul__ = __mul__ + + def _zeroth_power(self): + return self.module.one() + + def _first_power(self): + return self + + def __floordiv__(self, a): + if is_rat(a): + a = QQ(a) + return self * (1/a) + elif isinstance(a, ModuleElement): + return self * (1//a) + return NotImplemented + + def __rfloordiv__(self, a): + return a // self.over_power_basis() + + def __mod__(self, m): + r""" + Reduce this :py:class:`~.ModuleElement` mod a :py:class:`~.Submodule`. + + Parameters + ========== + + m : int, :ref:`ZZ`, :ref:`QQ`, :py:class:`~.Submodule` + If a :py:class:`~.Submodule`, reduce ``self`` relative to this. + If an integer or rational, reduce relative to the + :py:class:`~.Submodule` that is our own module times this constant. + + See Also + ======== + + .Submodule.reduce_element + + """ + if is_rat(m): + m = m * self.module.whole_submodule() + if isinstance(m, Submodule) and m.parent == self.module: + return m.reduce_element(self) + return NotImplemented + + +class PowerBasisElement(ModuleElement): + r""" + Subclass for :py:class:`~.ModuleElement` instances whose module is a + :py:class:`~.PowerBasis`. + """ + + @property + def T(self): + """Access the defining polynomial of the :py:class:`~.PowerBasis`.""" + return self.module.T + + def numerator(self, x=None): + """Obtain the numerator as a polynomial over :ref:`ZZ`.""" + x = x or self.T.gen + return Poly(reversed(self.coeffs), x, domain=ZZ) + + def poly(self, x=None): + """Obtain the number as a polynomial over :ref:`QQ`.""" + return self.numerator(x=x) // self.denom + + @property + def is_rational(self): + """Say whether this element represents a rational number.""" + return self.col[1:, :].is_zero_matrix + + @property + def generator(self): + """ + Return a :py:class:`~.Symbol` to be used when expressing this element + as a polynomial. + + If we have an associated :py:class:`~.AlgebraicField` whose primitive + element has an alias symbol, we use that. Otherwise we use the variable + of the minimal polynomial defining the power basis to which we belong. + """ + K = self.module.number_field + return K.ext.alias if K and K.ext.is_aliased else self.T.gen + + def as_expr(self, x=None): + """Create a Basic expression from ``self``. """ + return self.poly(x or self.generator).as_expr() + + def norm(self, T=None): + """Compute the norm of this number.""" + T = T or self.T + x = T.gen + A = self.numerator(x=x) + return T.resultant(A) // self.denom ** self.n + + def inverse(self): + f = self.poly() + f_inv = f.invert(self.T) + return self.module.element_from_poly(f_inv) + + def __rfloordiv__(self, a): + return self.inverse() * a + + def _negative_power(self, e, modulo=None): + return self.inverse() ** abs(e) + + def to_ANP(self): + """Convert to an equivalent :py:class:`~.ANP`. """ + return ANP(list(reversed(self.QQ_col.flat())), QQ.map(self.T.rep.to_list()), QQ) + + def to_alg_num(self): + """ + Try to convert to an equivalent :py:class:`~.AlgebraicNumber`. + + Explanation + =========== + + In general, the conversion from an :py:class:`~.AlgebraicNumber` to a + :py:class:`~.PowerBasisElement` throws away information, because an + :py:class:`~.AlgebraicNumber` specifies a complex embedding, while a + :py:class:`~.PowerBasisElement` does not. However, in some cases it is + possible to convert a :py:class:`~.PowerBasisElement` back into an + :py:class:`~.AlgebraicNumber`, namely when the associated + :py:class:`~.PowerBasis` has a reference to an + :py:class:`~.AlgebraicField`. + + Returns + ======= + + :py:class:`~.AlgebraicNumber` + + Raises + ====== + + StructureError + If the :py:class:`~.PowerBasis` to which this element belongs does + not have an associated :py:class:`~.AlgebraicField`. + + """ + K = self.module.number_field + if K: + return K.to_alg_num(self.to_ANP()) + raise StructureError("No associated AlgebraicField") + + +class ModuleHomomorphism: + r"""A homomorphism from one module to another.""" + + def __init__(self, domain, codomain, mapping): + r""" + Parameters + ========== + + domain : :py:class:`~.Module` + The domain of the mapping. + + codomain : :py:class:`~.Module` + The codomain of the mapping. + + mapping : callable + An arbitrary callable is accepted, but should be chosen so as + to represent an actual module homomorphism. In particular, should + accept elements of *domain* and return elements of *codomain*. + + Examples + ======== + + >>> from sympy import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis, ModuleHomomorphism + >>> T = Poly(cyclotomic_poly(5)) + >>> A = PowerBasis(T) + >>> B = A.submodule_from_gens([2*A(j) for j in range(4)]) + >>> phi = ModuleHomomorphism(A, B, lambda x: 6*x) + >>> print(phi.matrix()) # doctest: +SKIP + DomainMatrix([[3, 0, 0, 0], [0, 3, 0, 0], [0, 0, 3, 0], [0, 0, 0, 3]], (4, 4), ZZ) + + """ + self.domain = domain + self.codomain = codomain + self.mapping = mapping + + def matrix(self, modulus=None): + r""" + Compute the matrix of this homomorphism. + + Parameters + ========== + + modulus : int, optional + A positive prime number $p$ if the matrix should be reduced mod + $p$. + + Returns + ======= + + :py:class:`~.DomainMatrix` + The matrix is over :ref:`ZZ`, or else over :ref:`GF(p)` if a + modulus was given. + + """ + basis = self.domain.basis_elements() + cols = [self.codomain.represent(self.mapping(elt)) for elt in basis] + if not cols: + return DomainMatrix.zeros((self.codomain.n, 0), ZZ).to_dense() + M = cols[0].hstack(*cols[1:]) + if modulus: + M = M.convert_to(FF(modulus)) + return M + + def kernel(self, modulus=None): + r""" + Compute a Submodule representing the kernel of this homomorphism. + + Parameters + ========== + + modulus : int, optional + A positive prime number $p$ if the kernel should be computed mod + $p$. + + Returns + ======= + + :py:class:`~.Submodule` + This submodule's generators span the kernel of this + homomorphism over :ref:`ZZ`, or else over :ref:`GF(p)` if a + modulus was given. + + """ + M = self.matrix(modulus=modulus) + if modulus is None: + M = M.convert_to(QQ) + # Note: Even when working over a finite field, what we want here is + # the pullback into the integers, so in this case the conversion to ZZ + # below is appropriate. When working over ZZ, the kernel should be a + # ZZ-submodule, so, while the conversion to QQ above was required in + # order for the nullspace calculation to work, conversion back to ZZ + # afterward should always work. + # TODO: + # Watch , which calls + # for fraction-free algorithms. If this is implemented, we can skip + # the conversion to `QQ` above. + K = M.nullspace().convert_to(ZZ).transpose() + return self.domain.submodule_from_matrix(K) + + +class ModuleEndomorphism(ModuleHomomorphism): + r"""A homomorphism from one module to itself.""" + + def __init__(self, domain, mapping): + r""" + Parameters + ========== + + domain : :py:class:`~.Module` + The common domain and codomain of the mapping. + + mapping : callable + An arbitrary callable is accepted, but should be chosen so as + to represent an actual module endomorphism. In particular, should + accept and return elements of *domain*. + + """ + super().__init__(domain, domain, mapping) + + +class InnerEndomorphism(ModuleEndomorphism): + r""" + An inner endomorphism on a module, i.e. the endomorphism corresponding to + multiplication by a fixed element. + """ + + def __init__(self, domain, multiplier): + r""" + Parameters + ========== + + domain : :py:class:`~.Module` + The domain and codomain of the endomorphism. + + multiplier : :py:class:`~.ModuleElement` + The element $a$ defining the mapping as $x \mapsto a x$. + + """ + super().__init__(domain, lambda x: multiplier * x) + self.multiplier = multiplier + + +class EndomorphismRing: + r"""The ring of endomorphisms on a module.""" + + def __init__(self, domain): + """ + Parameters + ========== + + domain : :py:class:`~.Module` + The domain and codomain of the endomorphisms. + + """ + self.domain = domain + + def inner_endomorphism(self, multiplier): + r""" + Form an inner endomorphism belonging to this endomorphism ring. + + Parameters + ========== + + multiplier : :py:class:`~.ModuleElement` + Element $a$ defining the inner endomorphism $x \mapsto a x$. + + Returns + ======= + + :py:class:`~.InnerEndomorphism` + + """ + return InnerEndomorphism(self.domain, multiplier) + + def represent(self, element): + r""" + Represent an element of this endomorphism ring, as a single column + vector. + + Explanation + =========== + + Let $M$ be a module, and $E$ its ring of endomorphisms. Let $N$ be + another module, and consider a homomorphism $\varphi: N \rightarrow E$. + In the event that $\varphi$ is to be represented by a matrix $A$, each + column of $A$ must represent an element of $E$. This is possible when + the elements of $E$ are themselves representable as matrices, by + stacking the columns of such a matrix into a single column. + + This method supports calculating such matrices $A$, by representing + an element of this endomorphism ring first as a matrix, and then + stacking that matrix's columns into a single column. + + Examples + ======== + + Note that in these examples we print matrix transposes, to make their + columns easier to inspect. + + >>> from sympy import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.modules import PowerBasis + >>> from sympy.polys.numberfields.modules import ModuleHomomorphism + >>> T = Poly(cyclotomic_poly(5)) + >>> M = PowerBasis(T) + >>> E = M.endomorphism_ring() + + Let $\zeta$ be a primitive 5th root of unity, a generator of our field, + and consider the inner endomorphism $\tau$ on the ring of integers, + induced by $\zeta$: + + >>> zeta = M(1) + >>> tau = E.inner_endomorphism(zeta) + >>> tau.matrix().transpose() # doctest: +SKIP + DomainMatrix( + [[0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 0, 1], [-1, -1, -1, -1]], + (4, 4), ZZ) + + The matrix representation of $\tau$ is as expected. The first column + shows that multiplying by $\zeta$ carries $1$ to $\zeta$, the second + column that it carries $\zeta$ to $\zeta^2$, and so forth. + + The ``represent`` method of the endomorphism ring ``E`` stacks these + into a single column: + + >>> E.represent(tau).transpose() # doctest: +SKIP + DomainMatrix( + [[0, 1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1, -1, -1, -1, -1]], + (1, 16), ZZ) + + This is useful when we want to consider a homomorphism $\varphi$ having + ``E`` as codomain: + + >>> phi = ModuleHomomorphism(M, E, lambda x: E.inner_endomorphism(x)) + + and we want to compute the matrix of such a homomorphism: + + >>> phi.matrix().transpose() # doctest: +SKIP + DomainMatrix( + [[1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1], + [0, 1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1, -1, -1, -1, -1], + [0, 0, 1, 0, 0, 0, 0, 1, -1, -1, -1, -1, 1, 0, 0, 0], + [0, 0, 0, 1, -1, -1, -1, -1, 1, 0, 0, 0, 0, 1, 0, 0]], + (4, 16), ZZ) + + Note that the stacked matrix of $\tau$ occurs as the second column in + this example. This is because $\zeta$ is the second basis element of + ``M``, and $\varphi(\zeta) = \tau$. + + Parameters + ========== + + element : :py:class:`~.ModuleEndomorphism` belonging to this ring. + + Returns + ======= + + :py:class:`~.DomainMatrix` + Column vector equalling the vertical stacking of all the columns + of the matrix that represents the given *element* as a mapping. + + """ + if isinstance(element, ModuleEndomorphism) and element.domain == self.domain: + M = element.matrix() + # Transform the matrix into a single column, which should reproduce + # the original columns, one after another. + m, n = M.shape + if n == 0: + return M + return M[:, 0].vstack(*[M[:, j] for j in range(1, n)]) + raise NotImplementedError + + +def find_min_poly(alpha, domain, x=None, powers=None): + r""" + Find a polynomial of least degree (not necessarily irreducible) satisfied + by an element of a finitely-generated ring with unity. + + Examples + ======== + + For the $n$th cyclotomic field, $n$ an odd prime, consider the quadratic + equation whose roots are the two periods of length $(n-1)/2$. Article 356 + of Gauss tells us that we should get $x^2 + x - (n-1)/4$ or + $x^2 + x + (n+1)/4$ according to whether $n$ is 1 or 3 mod 4, respectively. + + >>> from sympy import Poly, cyclotomic_poly, primitive_root, QQ + >>> from sympy.abc import x + >>> from sympy.polys.numberfields.modules import PowerBasis, find_min_poly + >>> n = 13 + >>> g = primitive_root(n) + >>> C = PowerBasis(Poly(cyclotomic_poly(n, x))) + >>> ee = [g**(2*k+1) % n for k in range((n-1)//2)] + >>> eta = sum(C(e) for e in ee) + >>> print(find_min_poly(eta, QQ, x=x).as_expr()) + x**2 + x - 3 + >>> n = 19 + >>> g = primitive_root(n) + >>> C = PowerBasis(Poly(cyclotomic_poly(n, x))) + >>> ee = [g**(2*k+2) % n for k in range((n-1)//2)] + >>> eta = sum(C(e) for e in ee) + >>> print(find_min_poly(eta, QQ, x=x).as_expr()) + x**2 + x + 5 + + Parameters + ========== + + alpha : :py:class:`~.ModuleElement` + The element whose min poly is to be found, and whose module has + multiplication and starts with unity. + + domain : :py:class:`~.Domain` + The desired domain of the polynomial. + + x : :py:class:`~.Symbol`, optional + The desired variable for the polynomial. + + powers : list, optional + If desired, pass an empty list. The powers of *alpha* (as + :py:class:`~.ModuleElement` instances) from the zeroth up to the degree + of the min poly will be recorded here, as we compute them. + + Returns + ======= + + :py:class:`~.Poly`, ``None`` + The minimal polynomial for alpha, or ``None`` if no polynomial could be + found over the desired domain. + + Raises + ====== + + MissingUnityError + If the module to which alpha belongs does not start with unity. + ClosureFailure + If the module to which alpha belongs is not closed under + multiplication. + + """ + R = alpha.module + if not R.starts_with_unity(): + raise MissingUnityError("alpha must belong to finitely generated ring with unity.") + if powers is None: + powers = [] + one = R(0) + powers.append(one) + powers_matrix = one.column(domain=domain) + ak = alpha + m = None + for k in range(1, R.n + 1): + powers.append(ak) + ak_col = ak.column(domain=domain) + try: + X = powers_matrix._solve(ak_col)[0] + except DMBadInputError: + # This means alpha^k still isn't in the domain-span of the lower powers. + powers_matrix = powers_matrix.hstack(ak_col) + ak *= alpha + else: + # alpha^k is in the domain-span of the lower powers, so we have found a + # minimal-degree poly for alpha. + coeffs = [1] + [-c for c in reversed(X.to_list_flat())] + x = x or Dummy('x') + if domain.is_FF: + m = Poly(coeffs, x, modulus=domain.mod) + else: + m = Poly(coeffs, x, domain=domain) + break + return m diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/primes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/primes.py new file mode 100644 index 0000000000000000000000000000000000000000..8f28f13d94f33ed59cded8eabd05e9cf7d0f103f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/primes.py @@ -0,0 +1,784 @@ +"""Prime ideals in number fields. """ + +from sympy.polys.polytools import Poly +from sympy.polys.domains.finitefield import FF +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.domains.integerring import ZZ +from sympy.polys.matrices.domainmatrix import DomainMatrix +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.polyutils import IntegerPowerable +from sympy.utilities.decorator import public +from .basis import round_two, nilradical_mod_p +from .exceptions import StructureError +from .modules import ModuleEndomorphism, find_min_poly +from .utilities import coeff_search, supplement_a_subspace + + +def _check_formal_conditions_for_maximal_order(submodule): + r""" + Several functions in this module accept an argument which is to be a + :py:class:`~.Submodule` representing the maximal order in a number field, + such as returned by the :py:func:`~sympy.polys.numberfields.basis.round_two` + algorithm. + + We do not attempt to check that the given ``Submodule`` actually represents + a maximal order, but we do check a basic set of formal conditions that the + ``Submodule`` must satisfy, at a minimum. The purpose is to catch an + obviously ill-formed argument. + """ + prefix = 'The submodule representing the maximal order should ' + cond = None + if not submodule.is_power_basis_submodule(): + cond = 'be a direct submodule of a power basis.' + elif not submodule.starts_with_unity(): + cond = 'have 1 as its first generator.' + elif not submodule.is_sq_maxrank_HNF(): + cond = 'have square matrix, of maximal rank, in Hermite Normal Form.' + if cond is not None: + raise StructureError(prefix + cond) + + +class PrimeIdeal(IntegerPowerable): + r""" + A prime ideal in a ring of algebraic integers. + """ + + def __init__(self, ZK, p, alpha, f, e=None): + """ + Parameters + ========== + + ZK : :py:class:`~.Submodule` + The maximal order where this ideal lives. + p : int + The rational prime this ideal divides. + alpha : :py:class:`~.PowerBasisElement` + Such that the ideal is equal to ``p*ZK + alpha*ZK``. + f : int + The inertia degree. + e : int, ``None``, optional + The ramification index, if already known. If ``None``, we will + compute it here. + + """ + _check_formal_conditions_for_maximal_order(ZK) + self.ZK = ZK + self.p = p + self.alpha = alpha + self.f = f + self._test_factor = None + self.e = e if e is not None else self.valuation(p * ZK) + + def __str__(self): + if self.is_inert: + return f'({self.p})' + return f'({self.p}, {self.alpha.as_expr()})' + + @property + def is_inert(self): + """ + Say whether the rational prime we divide is inert, i.e. stays prime in + our ring of integers. + """ + return self.f == self.ZK.n + + def repr(self, field_gen=None, just_gens=False): + """ + Print a representation of this prime ideal. + + Examples + ======== + + >>> from sympy import cyclotomic_poly, QQ + >>> from sympy.abc import x, zeta + >>> T = cyclotomic_poly(7, x) + >>> K = QQ.algebraic_field((T, zeta)) + >>> P = K.primes_above(11) + >>> print(P[0].repr()) + [ (11, x**3 + 5*x**2 + 4*x - 1) e=1, f=3 ] + >>> print(P[0].repr(field_gen=zeta)) + [ (11, zeta**3 + 5*zeta**2 + 4*zeta - 1) e=1, f=3 ] + >>> print(P[0].repr(field_gen=zeta, just_gens=True)) + (11, zeta**3 + 5*zeta**2 + 4*zeta - 1) + + Parameters + ========== + + field_gen : :py:class:`~.Symbol`, ``None``, optional (default=None) + The symbol to use for the generator of the field. This will appear + in our representation of ``self.alpha``. If ``None``, we use the + variable of the defining polynomial of ``self.ZK``. + just_gens : bool, optional (default=False) + If ``True``, just print the "(p, alpha)" part, showing "just the + generators" of the prime ideal. Otherwise, print a string of the + form "[ (p, alpha) e=..., f=... ]", giving the ramification index + and inertia degree, along with the generators. + + """ + field_gen = field_gen or self.ZK.parent.T.gen + p, alpha, e, f = self.p, self.alpha, self.e, self.f + alpha_rep = str(alpha.numerator(x=field_gen).as_expr()) + if alpha.denom > 1: + alpha_rep = f'({alpha_rep})/{alpha.denom}' + gens = f'({p}, {alpha_rep})' + if just_gens: + return gens + return f'[ {gens} e={e}, f={f} ]' + + def __repr__(self): + return self.repr() + + def as_submodule(self): + r""" + Represent this prime ideal as a :py:class:`~.Submodule`. + + Explanation + =========== + + The :py:class:`~.PrimeIdeal` class serves to bundle information about + a prime ideal, such as its inertia degree, ramification index, and + two-generator representation, as well as to offer helpful methods like + :py:meth:`~.PrimeIdeal.valuation` and + :py:meth:`~.PrimeIdeal.test_factor`. + + However, in order to be added and multiplied by other ideals or + rational numbers, it must first be converted into a + :py:class:`~.Submodule`, which is a class that supports these + operations. + + In many cases, the user need not perform this conversion deliberately, + since it is automatically performed by the arithmetic operator methods + :py:meth:`~.PrimeIdeal.__add__` and :py:meth:`~.PrimeIdeal.__mul__`. + + Raising a :py:class:`~.PrimeIdeal` to a non-negative integer power is + also supported. + + Examples + ======== + + >>> from sympy import Poly, cyclotomic_poly, prime_decomp + >>> T = Poly(cyclotomic_poly(7)) + >>> P0 = prime_decomp(7, T)[0] + >>> print(P0**6 == 7*P0.ZK) + True + + Note that, on both sides of the equation above, we had a + :py:class:`~.Submodule`. In the next equation we recall that adding + ideals yields their GCD. This time, we need a deliberate conversion + to :py:class:`~.Submodule` on the right: + + >>> print(P0 + 7*P0.ZK == P0.as_submodule()) + True + + Returns + ======= + + :py:class:`~.Submodule` + Will be equal to ``self.p * self.ZK + self.alpha * self.ZK``. + + See Also + ======== + + __add__ + __mul__ + + """ + M = self.p * self.ZK + self.alpha * self.ZK + # Pre-set expensive boolean properties whose value we already know: + M._starts_with_unity = False + M._is_sq_maxrank_HNF = True + return M + + def __eq__(self, other): + if isinstance(other, PrimeIdeal): + return self.as_submodule() == other.as_submodule() + return NotImplemented + + def __add__(self, other): + """ + Convert to a :py:class:`~.Submodule` and add to another + :py:class:`~.Submodule`. + + See Also + ======== + + as_submodule + + """ + return self.as_submodule() + other + + __radd__ = __add__ + + def __mul__(self, other): + """ + Convert to a :py:class:`~.Submodule` and multiply by another + :py:class:`~.Submodule` or a rational number. + + See Also + ======== + + as_submodule + + """ + return self.as_submodule() * other + + __rmul__ = __mul__ + + def _zeroth_power(self): + return self.ZK + + def _first_power(self): + return self + + def test_factor(self): + r""" + Compute a test factor for this prime ideal. + + Explanation + =========== + + Write $\mathfrak{p}$ for this prime ideal, $p$ for the rational prime + it divides. Then, for computing $\mathfrak{p}$-adic valuations it is + useful to have a number $\beta \in \mathbb{Z}_K$ such that + $p/\mathfrak{p} = p \mathbb{Z}_K + \beta \mathbb{Z}_K$. + + Essentially, this is the same as the number $\Psi$ (or the "reagent") + from Kummer's 1847 paper (*Ueber die Zerlegung...*, Crelle vol. 35) in + which ideal divisors were invented. + """ + if self._test_factor is None: + self._test_factor = _compute_test_factor(self.p, [self.alpha], self.ZK) + return self._test_factor + + def valuation(self, I): + r""" + Compute the $\mathfrak{p}$-adic valuation of integral ideal I at this + prime ideal. + + Parameters + ========== + + I : :py:class:`~.Submodule` + + See Also + ======== + + prime_valuation + + """ + return prime_valuation(I, self) + + def reduce_element(self, elt): + """ + Reduce a :py:class:`~.PowerBasisElement` to a "small representative" + modulo this prime ideal. + + Parameters + ========== + + elt : :py:class:`~.PowerBasisElement` + The element to be reduced. + + Returns + ======= + + :py:class:`~.PowerBasisElement` + The reduced element. + + See Also + ======== + + reduce_ANP + reduce_alg_num + .Submodule.reduce_element + + """ + return self.as_submodule().reduce_element(elt) + + def reduce_ANP(self, a): + """ + Reduce an :py:class:`~.ANP` to a "small representative" modulo this + prime ideal. + + Parameters + ========== + + elt : :py:class:`~.ANP` + The element to be reduced. + + Returns + ======= + + :py:class:`~.ANP` + The reduced element. + + See Also + ======== + + reduce_element + reduce_alg_num + .Submodule.reduce_element + + """ + elt = self.ZK.parent.element_from_ANP(a) + red = self.reduce_element(elt) + return red.to_ANP() + + def reduce_alg_num(self, a): + """ + Reduce an :py:class:`~.AlgebraicNumber` to a "small representative" + modulo this prime ideal. + + Parameters + ========== + + elt : :py:class:`~.AlgebraicNumber` + The element to be reduced. + + Returns + ======= + + :py:class:`~.AlgebraicNumber` + The reduced element. + + See Also + ======== + + reduce_element + reduce_ANP + .Submodule.reduce_element + + """ + elt = self.ZK.parent.element_from_alg_num(a) + red = self.reduce_element(elt) + return a.field_element(list(reversed(red.QQ_col.flat()))) + + +def _compute_test_factor(p, gens, ZK): + r""" + Compute the test factor for a :py:class:`~.PrimeIdeal` $\mathfrak{p}$. + + Parameters + ========== + + p : int + The rational prime $\mathfrak{p}$ divides + + gens : list of :py:class:`PowerBasisElement` + A complete set of generators for $\mathfrak{p}$ over *ZK*, EXCEPT that + an element equivalent to rational *p* can and should be omitted (since + it has no effect except to waste time). + + ZK : :py:class:`~.Submodule` + The maximal order where the prime ideal $\mathfrak{p}$ lives. + + Returns + ======= + + :py:class:`~.PowerBasisElement` + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Proposition 4.8.15.) + + """ + _check_formal_conditions_for_maximal_order(ZK) + E = ZK.endomorphism_ring() + matrices = [E.inner_endomorphism(g).matrix(modulus=p) for g in gens] + B = DomainMatrix.zeros((0, ZK.n), FF(p)).vstack(*matrices) + # A nonzero element of the nullspace of B will represent a + # lin comb over the omegas which (i) is not a multiple of p + # (since it is nonzero over FF(p)), while (ii) is such that + # its product with each g in gens _is_ a multiple of p (since + # B represents multiplication by these generators). Theory + # predicts that such an element must exist, so nullspace should + # be non-trivial. + x = B.nullspace()[0, :].transpose() + beta = ZK.parent(ZK.matrix * x.convert_to(ZZ), denom=ZK.denom) + return beta + + +@public +def prime_valuation(I, P): + r""" + Compute the *P*-adic valuation for an integral ideal *I*. + + Examples + ======== + + >>> from sympy import QQ + >>> from sympy.polys.numberfields import prime_valuation + >>> K = QQ.cyclotomic_field(5) + >>> P = K.primes_above(5) + >>> ZK = K.maximal_order() + >>> print(prime_valuation(25*ZK, P[0])) + 8 + + Parameters + ========== + + I : :py:class:`~.Submodule` + An integral ideal whose valuation is desired. + + P : :py:class:`~.PrimeIdeal` + The prime at which to compute the valuation. + + Returns + ======= + + int + + See Also + ======== + + .PrimeIdeal.valuation + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithm 4.8.17.) + + """ + p, ZK = P.p, P.ZK + n, W, d = ZK.n, ZK.matrix, ZK.denom + + A = W.convert_to(QQ).inv() * I.matrix * d / I.denom + # Although A must have integer entries, given that I is an integral ideal, + # as a DomainMatrix it will still be over QQ, so we convert back: + A = A.convert_to(ZZ) + D = A.det() + if D % p != 0: + return 0 + + beta = P.test_factor() + + f = d ** n // W.det() + need_complete_test = (f % p == 0) + v = 0 + while True: + # Entering the loop, the cols of A represent lin combs of omegas. + # Turn them into lin combs of thetas: + A = W * A + # And then one column at a time... + for j in range(n): + c = ZK.parent(A[:, j], denom=d) + c *= beta + # ...turn back into lin combs of omegas, after multiplying by beta: + c = ZK.represent(c).flat() + for i in range(n): + A[i, j] = c[i] + if A[n - 1, n - 1].element % p != 0: + break + A = A / p + # As noted above, domain converts to QQ even when division goes evenly. + # So must convert back, even when we don't "need_complete_test". + if need_complete_test: + # In this case, having a non-integer entry is actually just our + # halting condition. + try: + A = A.convert_to(ZZ) + except CoercionFailed: + break + else: + # In this case theory says we should not have any non-integer entries. + A = A.convert_to(ZZ) + v += 1 + return v + + +def _two_elt_rep(gens, ZK, p, f=None, Np=None): + r""" + Given a set of *ZK*-generators of a prime ideal, compute a set of just two + *ZK*-generators for the same ideal, one of which is *p* itself. + + Parameters + ========== + + gens : list of :py:class:`PowerBasisElement` + Generators for the prime ideal over *ZK*, the ring of integers of the + field $K$. + + ZK : :py:class:`~.Submodule` + The maximal order in $K$. + + p : int + The rational prime divided by the prime ideal. + + f : int, optional + The inertia degree of the prime ideal, if known. + + Np : int, optional + The norm $p^f$ of the prime ideal, if known. + NOTE: There is no reason to supply both *f* and *Np*. Either one will + save us from having to compute the norm *Np* ourselves. If both are known, + *Np* is preferred since it saves one exponentiation. + + Returns + ======= + + :py:class:`~.PowerBasisElement` representing a single algebraic integer + alpha such that the prime ideal is equal to ``p*ZK + alpha*ZK``. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithm 4.7.10.) + + """ + _check_formal_conditions_for_maximal_order(ZK) + pb = ZK.parent + T = pb.T + # Detect the special cases in which either (a) all generators are multiples + # of p, or (b) there are no generators (so `all` is vacuously true): + if all((g % p).equiv(0) for g in gens): + return pb.zero() + + if Np is None: + if f is not None: + Np = p**f + else: + Np = abs(pb.submodule_from_gens(gens).matrix.det()) + + omega = ZK.basis_element_pullbacks() + beta = [p*om for om in omega[1:]] # note: we omit omega[0] == 1 + beta += gens + search = coeff_search(len(beta), 1) + for c in search: + alpha = sum(ci*betai for ci, betai in zip(c, beta)) + # Note: It may be tempting to reduce alpha mod p here, to try to work + # with smaller numbers, but must not do that, as it can result in an + # infinite loop! E.g. try factoring 2 in Q(sqrt(-7)). + n = alpha.norm(T) // Np + if n % p != 0: + # Now can reduce alpha mod p. + return alpha % p + + +def _prime_decomp_easy_case(p, ZK): + r""" + Compute the decomposition of rational prime *p* in the ring of integers + *ZK* (given as a :py:class:`~.Submodule`), in the "easy case", i.e. the + case where *p* does not divide the index of $\theta$ in *ZK*, where + $\theta$ is the generator of the ``PowerBasis`` of which *ZK* is a + ``Submodule``. + """ + T = ZK.parent.T + T_bar = Poly(T, modulus=p) + lc, fl = T_bar.factor_list() + if len(fl) == 1 and fl[0][1] == 1: + return [PrimeIdeal(ZK, p, ZK.parent.zero(), ZK.n, 1)] + return [PrimeIdeal(ZK, p, + ZK.parent.element_from_poly(Poly(t, domain=ZZ)), + t.degree(), e) + for t, e in fl] + + +def _prime_decomp_compute_kernel(I, p, ZK): + r""" + Parameters + ========== + + I : :py:class:`~.Module` + An ideal of ``ZK/pZK``. + p : int + The rational prime being factored. + ZK : :py:class:`~.Submodule` + The maximal order. + + Returns + ======= + + Pair ``(N, G)``, where: + + ``N`` is a :py:class:`~.Module` representing the kernel of the map + ``a |--> a**p - a`` on ``(O/pO)/I``, guaranteed to be a module with + unity. + + ``G`` is a :py:class:`~.Module` representing a basis for the separable + algebra ``A = O/I`` (see Cohen). + + """ + W = I.matrix + n, r = W.shape + # Want to take the Fp-basis given by the columns of I, adjoin (1, 0, ..., 0) + # (which we know is not already in there since I is a basis for a prime ideal) + # and then supplement this with additional columns to make an invertible n x n + # matrix. This will then represent a full basis for ZK, whose first r columns + # are pullbacks of the basis for I. + if r == 0: + B = W.eye(n, ZZ) + else: + B = W.hstack(W.eye(n, ZZ)[:, 0]) + if B.shape[1] < n: + B = supplement_a_subspace(B.convert_to(FF(p))).convert_to(ZZ) + + G = ZK.submodule_from_matrix(B) + # Must compute G's multiplication table _before_ discarding the first r + # columns. (See Step 9 in Alg 6.2.9 in Cohen, where the betas are actually + # needed in order to represent each product of gammas. However, once we've + # found the representations, then we can ignore the betas.) + G.compute_mult_tab() + G = G.discard_before(r) + + phi = ModuleEndomorphism(G, lambda x: x**p - x) + N = phi.kernel(modulus=p) + assert N.starts_with_unity() + return N, G + + +def _prime_decomp_maximal_ideal(I, p, ZK): + r""" + We have reached the case where we have a maximal (hence prime) ideal *I*, + which we know because the quotient ``O/I`` is a field. + + Parameters + ========== + + I : :py:class:`~.Module` + An ideal of ``O/pO``. + p : int + The rational prime being factored. + ZK : :py:class:`~.Submodule` + The maximal order. + + Returns + ======= + + :py:class:`~.PrimeIdeal` instance representing this prime + + """ + m, n = I.matrix.shape + f = m - n + G = ZK.matrix * I.matrix + gens = [ZK.parent(G[:, j], denom=ZK.denom) for j in range(G.shape[1])] + alpha = _two_elt_rep(gens, ZK, p, f=f) + return PrimeIdeal(ZK, p, alpha, f) + + +def _prime_decomp_split_ideal(I, p, N, G, ZK): + r""" + Perform the step in the prime decomposition algorithm where we have determined + the quotient ``ZK/I`` is _not_ a field, and we want to perform a non-trivial + factorization of *I* by locating an idempotent element of ``ZK/I``. + """ + assert I.parent == ZK and G.parent is ZK and N.parent is G + # Since ZK/I is not a field, the kernel computed in the previous step contains + # more than just the prime field Fp, and our basis N for the nullspace therefore + # contains at least a second column (which represents an element outside Fp). + # Let alpha be such an element: + alpha = N(1).to_parent() + assert alpha.module is G + + alpha_powers = [] + m = find_min_poly(alpha, FF(p), powers=alpha_powers) + # TODO (future work): + # We don't actually need full factorization, so might use a faster method + # to just break off a single non-constant factor m1? + lc, fl = m.factor_list() + m1 = fl[0][0] + m2 = m.quo(m1) + U, V, g = m1.gcdex(m2) + # Sanity check: theory says m is squarefree, so m1, m2 should be coprime: + assert g == 1 + E = list(reversed(Poly(U * m1, domain=ZZ).rep.to_list())) + eps1 = sum(E[i]*alpha_powers[i] for i in range(len(E))) + eps2 = 1 - eps1 + idemps = [eps1, eps2] + factors = [] + for eps in idemps: + e = eps.to_parent() + assert e.module is ZK + D = I.matrix.convert_to(FF(p)).hstack(*[ + (e * om).column(domain=FF(p)) for om in ZK.basis_elements() + ]) + W = D.columnspace().convert_to(ZZ) + H = ZK.submodule_from_matrix(W) + factors.append(H) + return factors + + +@public +def prime_decomp(p, T=None, ZK=None, dK=None, radical=None): + r""" + Compute the decomposition of rational prime *p* in a number field. + + Explanation + =========== + + Ordinarily this should be accessed through the + :py:meth:`~.AlgebraicField.primes_above` method of an + :py:class:`~.AlgebraicField`. + + Examples + ======== + + >>> from sympy import Poly, QQ + >>> from sympy.abc import x, theta + >>> T = Poly(x ** 3 + x ** 2 - 2 * x + 8) + >>> K = QQ.algebraic_field((T, theta)) + >>> print(K.primes_above(2)) + [[ (2, x**2 + 1) e=1, f=1 ], [ (2, (x**2 + 3*x + 2)/2) e=1, f=1 ], + [ (2, (3*x**2 + 3*x)/2) e=1, f=1 ]] + + Parameters + ========== + + p : int + The rational prime whose decomposition is desired. + + T : :py:class:`~.Poly`, optional + Monic irreducible polynomial defining the number field $K$ in which to + factor. NOTE: at least one of *T* or *ZK* must be provided. + + ZK : :py:class:`~.Submodule`, optional + The maximal order for $K$, if already known. + NOTE: at least one of *T* or *ZK* must be provided. + + dK : int, optional + The discriminant of the field $K$, if already known. + + radical : :py:class:`~.Submodule`, optional + The nilradical mod *p* in the integers of $K$, if already known. + + Returns + ======= + + List of :py:class:`~.PrimeIdeal` instances. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithm 6.2.9.) + + """ + if T is None and ZK is None: + raise ValueError('At least one of T or ZK must be provided.') + if ZK is not None: + _check_formal_conditions_for_maximal_order(ZK) + if T is None: + T = ZK.parent.T + radicals = {} + if dK is None or ZK is None: + ZK, dK = round_two(T, radicals=radicals) + dT = T.discriminant() + f_squared = dT // dK + if f_squared % p != 0: + return _prime_decomp_easy_case(p, ZK) + radical = radical or radicals.get(p) or nilradical_mod_p(ZK, p) + stack = [radical] + primes = [] + while stack: + I = stack.pop() + N, G = _prime_decomp_compute_kernel(I, p, ZK) + if N.n == 1: + P = _prime_decomp_maximal_ideal(I, p, ZK) + primes.append(P) + else: + I1, I2 = _prime_decomp_split_ideal(I, p, N, G, ZK) + stack.extend([I1, I2]) + return primes diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/resolvent_lookup.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/resolvent_lookup.py new file mode 100644 index 0000000000000000000000000000000000000000..71812c0d7aec6501039eefe4f3602b1916628071 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/resolvent_lookup.py @@ -0,0 +1,456 @@ +"""Lookup table for Galois resolvents for polys of degree 4 through 6. """ +# This table was generated by a call to +# `sympy.polys.numberfields.galois_resolvents.generate_lambda_lookup()`. +# The entire job took 543.23s. +# Of this, Case (6, 1) took 539.03s. +# The final polynomial of Case (6, 1) alone took 455.09s. +resolvent_coeff_lambdas = { + (4, 0): [ + lambda s1, s2, s3, s4: (-2*s1*s2 + 6*s3), + lambda s1, s2, s3, s4: (2*s1**3*s3 + s1**2*s2**2 + s1**2*s4 - 17*s1*s2*s3 + 2*s2**3 - 8*s2*s4 + 24*s3**2), + lambda s1, s2, s3, s4: (-2*s1**5*s4 - 2*s1**4*s2*s3 + 10*s1**3*s2*s4 + 8*s1**3*s3**2 + 10*s1**2*s2**2*s3 - +12*s1**2*s3*s4 - 2*s1*s2**4 - 54*s1*s2*s3**2 + 32*s1*s4**2 + 8*s2**3*s3 - 32*s2*s3*s4 ++ 56*s3**3), + lambda s1, s2, s3, s4: (2*s1**6*s2*s4 + s1**6*s3**2 - 5*s1**5*s3*s4 - 11*s1**4*s2**2*s4 - 13*s1**4*s2*s3**2 ++ 7*s1**4*s4**2 + 3*s1**3*s2**3*s3 + 30*s1**3*s2*s3*s4 + 22*s1**3*s3**3 + 10*s1**2*s2**3*s4 ++ 33*s1**2*s2**2*s3**2 - 72*s1**2*s2*s4**2 - 36*s1**2*s3**2*s4 - 13*s1*s2**4*s3 + +48*s1*s2**2*s3*s4 - 116*s1*s2*s3**3 + 144*s1*s3*s4**2 + s2**6 - 12*s2**4*s4 + 22*s2**3*s3**2 ++ 48*s2**2*s4**2 - 120*s2*s3**2*s4 + 96*s3**4 - 64*s4**3), + lambda s1, s2, s3, s4: (-2*s1**8*s3*s4 - s1**7*s4**2 + 22*s1**6*s2*s3*s4 + 2*s1**6*s3**3 - 2*s1**5*s2**3*s4 +- s1**5*s2**2*s3**2 - 29*s1**5*s3**2*s4 - 60*s1**4*s2**2*s3*s4 - 19*s1**4*s2*s3**3 ++ 38*s1**4*s3*s4**2 + 9*s1**3*s2**4*s4 + 10*s1**3*s2**3*s3**2 + 24*s1**3*s2**2*s4**2 ++ 134*s1**3*s2*s3**2*s4 + 28*s1**3*s3**4 + 16*s1**3*s4**3 - s1**2*s2**5*s3 - 4*s1**2*s2**3*s3*s4 ++ 34*s1**2*s2**2*s3**3 - 288*s1**2*s2*s3*s4**2 - 104*s1**2*s3**3*s4 - 19*s1*s2**4*s3**2 ++ 120*s1*s2**2*s3**2*s4 - 128*s1*s2*s3**4 + 336*s1*s3**2*s4**2 + 2*s2**6*s3 - 24*s2**4*s3*s4 ++ 28*s2**3*s3**3 + 96*s2**2*s3*s4**2 - 176*s2*s3**3*s4 + 96*s3**5 - 128*s3*s4**3), + lambda s1, s2, s3, s4: (s1**10*s4**2 - 11*s1**8*s2*s4**2 - 2*s1**8*s3**2*s4 + s1**7*s2**2*s3*s4 + 15*s1**7*s3*s4**2 ++ 45*s1**6*s2**2*s4**2 + 17*s1**6*s2*s3**2*s4 + s1**6*s3**4 - 5*s1**6*s4**3 - 12*s1**5*s2**3*s3*s4 +- 133*s1**5*s2*s3*s4**2 - 22*s1**5*s3**3*s4 + s1**4*s2**5*s4 - 76*s1**4*s2**3*s4**2 +- 6*s1**4*s2**2*s3**2*s4 - 12*s1**4*s2*s3**4 + 32*s1**4*s2*s4**3 + 128*s1**4*s3**2*s4**2 ++ 29*s1**3*s2**4*s3*s4 + 2*s1**3*s2**3*s3**3 + 344*s1**3*s2**2*s3*s4**2 + 48*s1**3*s2*s3**3*s4 ++ 16*s1**3*s3**5 - 48*s1**3*s3*s4**3 - 4*s1**2*s2**6*s4 + 32*s1**2*s2**4*s4**2 - 134*s1**2*s2**3*s3**2*s4 ++ 36*s1**2*s2**2*s3**4 - 64*s1**2*s2**2*s4**3 - 648*s1**2*s2*s3**2*s4**2 - 48*s1**2*s3**4*s4 ++ 16*s1*s2**5*s3*s4 - 12*s1*s2**4*s3**3 - 128*s1*s2**3*s3*s4**2 + 296*s1*s2**2*s3**3*s4 +- 96*s1*s2*s3**5 + 256*s1*s2*s3*s4**3 + 416*s1*s3**3*s4**2 + s2**6*s3**2 - 28*s2**4*s3**2*s4 ++ 16*s2**3*s3**4 + 176*s2**2*s3**2*s4**2 - 224*s2*s3**4*s4 + 64*s3**6 - 320*s3**2*s4**3) + ], + (4, 1): [ + lambda s1, s2, s3, s4: (-s2), + lambda s1, s2, s3, s4: (s1*s3 - 4*s4), + lambda s1, s2, s3, s4: (-s1**2*s4 + 4*s2*s4 - s3**2) + ], + (5, 1): [ + lambda s1, s2, s3, s4, s5: (-2*s1*s3 + 8*s4), + lambda s1, s2, s3, s4, s5: (-8*s1**3*s5 + 2*s1**2*s2*s4 + s1**2*s3**2 + 30*s1*s2*s5 - 14*s1*s3*s4 - 6*s2**2*s4 ++ 2*s2*s3**2 - 50*s3*s5 + 40*s4**2), + lambda s1, s2, s3, s4, s5: (16*s1**4*s3*s5 - 2*s1**4*s4**2 - 2*s1**3*s2**2*s5 - 2*s1**3*s2*s3*s4 - 44*s1**3*s4*s5 +- 66*s1**2*s2*s3*s5 + 21*s1**2*s2*s4**2 + 6*s1**2*s3**2*s4 - 50*s1**2*s5**2 + 9*s1*s2**3*s5 ++ 5*s1*s2**2*s3*s4 - 2*s1*s2*s3**3 + 190*s1*s2*s4*s5 + 120*s1*s3**2*s5 - 80*s1*s3*s4**2 +- 15*s2**2*s3*s5 - 40*s2**2*s4**2 + 21*s2*s3**2*s4 + 125*s2*s5**2 - 2*s3**4 - 400*s3*s4*s5 ++ 160*s4**3), + lambda s1, s2, s3, s4, s5: (16*s1**6*s5**2 - 8*s1**5*s2*s4*s5 - 8*s1**5*s3**2*s5 + 2*s1**5*s3*s4**2 + 2*s1**4*s2**2*s3*s5 ++ s1**4*s2**2*s4**2 - 120*s1**4*s2*s5**2 + 68*s1**4*s3*s4*s5 - 8*s1**4*s4**3 + 46*s1**3*s2**2*s4*s5 ++ 28*s1**3*s2*s3**2*s5 - 19*s1**3*s2*s3*s4**2 + 250*s1**3*s3*s5**2 - 144*s1**3*s4**2*s5 +- 9*s1**2*s2**3*s3*s5 - 6*s1**2*s2**3*s4**2 + 3*s1**2*s2**2*s3**2*s4 + 225*s1**2*s2**2*s5**2 +- 354*s1**2*s2*s3*s4*s5 + 76*s1**2*s2*s4**3 - 70*s1**2*s3**3*s5 + 41*s1**2*s3**2*s4**2 +- 200*s1**2*s4*s5**2 - 54*s1*s2**3*s4*s5 + 45*s1*s2**2*s3**2*s5 + 30*s1*s2**2*s3*s4**2 +- 19*s1*s2*s3**3*s4 - 875*s1*s2*s3*s5**2 + 640*s1*s2*s4**2*s5 + 2*s1*s3**5 + 630*s1*s3**2*s4*s5 +- 264*s1*s3*s4**3 + 9*s2**4*s4**2 - 6*s2**3*s3**2*s4 + s2**2*s3**4 + 90*s2**2*s3*s4*s5 +- 136*s2**2*s4**3 - 50*s2*s3**3*s5 + 76*s2*s3**2*s4**2 + 500*s2*s4*s5**2 - 8*s3**4*s4 ++ 625*s3**2*s5**2 - 1400*s3*s4**2*s5 + 400*s4**4), + lambda s1, s2, s3, s4, s5: (-32*s1**7*s3*s5**2 + 8*s1**7*s4**2*s5 + 8*s1**6*s2**2*s5**2 + 8*s1**6*s2*s3*s4*s5 +- 2*s1**6*s2*s4**3 + 48*s1**6*s4*s5**2 - 2*s1**5*s2**3*s4*s5 + 264*s1**5*s2*s3*s5**2 +- 94*s1**5*s2*s4**2*s5 - 24*s1**5*s3**2*s4*s5 + 6*s1**5*s3*s4**3 - 56*s1**5*s5**3 +- 66*s1**4*s2**3*s5**2 - 50*s1**4*s2**2*s3*s4*s5 + 19*s1**4*s2**2*s4**3 + 8*s1**4*s2*s3**3*s5 +- 2*s1**4*s2*s3**2*s4**2 - 318*s1**4*s2*s4*s5**2 - 352*s1**4*s3**2*s5**2 + 166*s1**4*s3*s4**2*s5 ++ 3*s1**4*s4**4 + 15*s1**3*s2**4*s4*s5 - 2*s1**3*s2**3*s3**2*s5 - s1**3*s2**3*s3*s4**2 +- 574*s1**3*s2**2*s3*s5**2 + 347*s1**3*s2**2*s4**2*s5 + 194*s1**3*s2*s3**2*s4*s5 - +89*s1**3*s2*s3*s4**3 + 350*s1**3*s2*s5**3 - 8*s1**3*s3**4*s5 + 4*s1**3*s3**3*s4**2 ++ 1090*s1**3*s3*s4*s5**2 - 364*s1**3*s4**3*s5 + 162*s1**2*s2**4*s5**2 + 33*s1**2*s2**3*s3*s4*s5 +- 51*s1**2*s2**3*s4**3 - 32*s1**2*s2**2*s3**3*s5 + 28*s1**2*s2**2*s3**2*s4**2 + 305*s1**2*s2**2*s4*s5**2 +- 2*s1**2*s2*s3**4*s4 + 1340*s1**2*s2*s3**2*s5**2 - 901*s1**2*s2*s3*s4**2*s5 + 76*s1**2*s2*s4**4 +- 234*s1**2*s3**3*s4*s5 + 102*s1**2*s3**2*s4**3 - 750*s1**2*s3*s5**3 - 550*s1**2*s4**2*s5**2 +- 27*s1*s2**5*s4*s5 + 9*s1*s2**4*s3**2*s5 + 3*s1*s2**4*s3*s4**2 - s1*s2**3*s3**3*s4 ++ 180*s1*s2**3*s3*s5**2 - 366*s1*s2**3*s4**2*s5 - 231*s1*s2**2*s3**2*s4*s5 + 212*s1*s2**2*s3*s4**3 +- 375*s1*s2**2*s5**3 + 112*s1*s2*s3**4*s5 - 89*s1*s2*s3**3*s4**2 - 3075*s1*s2*s3*s4*s5**2 ++ 1640*s1*s2*s4**3*s5 + 6*s1*s3**5*s4 - 850*s1*s3**3*s5**2 + 1220*s1*s3**2*s4**2*s5 +- 384*s1*s3*s4**4 + 2500*s1*s4*s5**3 - 108*s2**5*s5**2 + 117*s2**4*s3*s4*s5 + 32*s2**4*s4**3 +- 31*s2**3*s3**3*s5 - 51*s2**3*s3**2*s4**2 + 525*s2**3*s4*s5**2 + 19*s2**2*s3**4*s4 +- 325*s2**2*s3**2*s5**2 + 260*s2**2*s3*s4**2*s5 - 256*s2**2*s4**4 - 2*s2*s3**6 + 105*s2*s3**3*s4*s5 ++ 76*s2*s3**2*s4**3 + 625*s2*s3*s5**3 - 500*s2*s4**2*s5**2 - 58*s3**5*s5 + 3*s3**4*s4**2 ++ 2750*s3**2*s4*s5**2 - 2400*s3*s4**3*s5 + 512*s4**5 - 3125*s5**4), + lambda s1, s2, s3, s4, s5: (16*s1**8*s3**2*s5**2 - 8*s1**8*s3*s4**2*s5 + s1**8*s4**4 - 8*s1**7*s2**2*s3*s5**2 ++ 2*s1**7*s2**2*s4**2*s5 - 48*s1**7*s3*s4*s5**2 + 12*s1**7*s4**3*s5 + s1**6*s2**4*s5**2 ++ 12*s1**6*s2**2*s4*s5**2 - 144*s1**6*s2*s3**2*s5**2 + 88*s1**6*s2*s3*s4**2*s5 - 13*s1**6*s2*s4**4 ++ 56*s1**6*s3*s5**3 + 86*s1**6*s4**2*s5**2 + 72*s1**5*s2**3*s3*s5**2 - 22*s1**5*s2**3*s4**2*s5 +- 4*s1**5*s2**2*s3**2*s4*s5 + s1**5*s2**2*s3*s4**3 - 14*s1**5*s2**2*s5**3 + 304*s1**5*s2*s3*s4*s5**2 +- 148*s1**5*s2*s4**3*s5 + 152*s1**5*s3**3*s5**2 - 54*s1**5*s3**2*s4**2*s5 + 5*s1**5*s3*s4**4 +- 468*s1**5*s4*s5**3 - 9*s1**4*s2**5*s5**2 + s1**4*s2**4*s3*s4*s5 - 76*s1**4*s2**3*s4*s5**2 ++ 370*s1**4*s2**2*s3**2*s5**2 - 287*s1**4*s2**2*s3*s4**2*s5 + 65*s1**4*s2**2*s4**4 +- 28*s1**4*s2*s3**3*s4*s5 + 5*s1**4*s2*s3**2*s4**3 - 200*s1**4*s2*s3*s5**3 - 294*s1**4*s2*s4**2*s5**2 ++ 8*s1**4*s3**5*s5 - 2*s1**4*s3**4*s4**2 - 676*s1**4*s3**2*s4*s5**2 + 180*s1**4*s3*s4**3*s5 ++ 17*s1**4*s4**5 + 625*s1**4*s5**4 - 210*s1**3*s2**4*s3*s5**2 + 76*s1**3*s2**4*s4**2*s5 ++ 43*s1**3*s2**3*s3**2*s4*s5 - 15*s1**3*s2**3*s3*s4**3 + 50*s1**3*s2**3*s5**3 - 6*s1**3*s2**2*s3**4*s5 ++ 2*s1**3*s2**2*s3**3*s4**2 - 397*s1**3*s2**2*s3*s4*s5**2 + 514*s1**3*s2**2*s4**3*s5 +- 700*s1**3*s2*s3**3*s5**2 + 447*s1**3*s2*s3**2*s4**2*s5 - 118*s1**3*s2*s3*s4**4 + +2300*s1**3*s2*s4*s5**3 - 12*s1**3*s3**4*s4*s5 + 6*s1**3*s3**3*s4**3 + 250*s1**3*s3**2*s5**3 ++ 1470*s1**3*s3*s4**2*s5**2 - 276*s1**3*s4**4*s5 + 27*s1**2*s2**6*s5**2 - 9*s1**2*s2**5*s3*s4*s5 ++ s1**2*s2**5*s4**3 + s1**2*s2**4*s3**3*s5 + 141*s1**2*s2**4*s4*s5**2 - 185*s1**2*s2**3*s3**2*s5**2 ++ 168*s1**2*s2**3*s3*s4**2*s5 - 128*s1**2*s2**3*s4**4 + 93*s1**2*s2**2*s3**3*s4*s5 ++ 19*s1**2*s2**2*s3**2*s4**3 - 125*s1**2*s2**2*s3*s5**3 - 610*s1**2*s2**2*s4**2*s5**2 +- 36*s1**2*s2*s3**5*s5 + 5*s1**2*s2*s3**4*s4**2 + 1995*s1**2*s2*s3**2*s4*s5**2 - 1174*s1**2*s2*s3*s4**3*s5 +- 16*s1**2*s2*s4**5 - 3125*s1**2*s2*s5**4 + 375*s1**2*s3**4*s5**2 - 172*s1**2*s3**3*s4**2*s5 ++ 82*s1**2*s3**2*s4**4 - 3500*s1**2*s3*s4*s5**3 - 1450*s1**2*s4**3*s5**2 + 198*s1*s2**5*s3*s5**2 +- 78*s1*s2**5*s4**2*s5 - 95*s1*s2**4*s3**2*s4*s5 + 44*s1*s2**4*s3*s4**3 + 25*s1*s2**3*s3**4*s5 +- 15*s1*s2**3*s3**3*s4**2 + 15*s1*s2**3*s3*s4*s5**2 - 384*s1*s2**3*s4**3*s5 + s1*s2**2*s3**5*s4 ++ 525*s1*s2**2*s3**3*s5**2 - 528*s1*s2**2*s3**2*s4**2*s5 + 384*s1*s2**2*s3*s4**4 - +1750*s1*s2**2*s4*s5**3 - 29*s1*s2*s3**4*s4*s5 - 118*s1*s2*s3**3*s4**3 + 625*s1*s2*s3**2*s5**3 +- 850*s1*s2*s3*s4**2*s5**2 + 1760*s1*s2*s4**4*s5 + 38*s1*s3**6*s5 + 5*s1*s3**5*s4**2 +- 2050*s1*s3**3*s4*s5**2 + 780*s1*s3**2*s4**3*s5 - 192*s1*s3*s4**5 + 3125*s1*s3*s5**4 ++ 7500*s1*s4**2*s5**3 - 27*s2**7*s5**2 + 18*s2**6*s3*s4*s5 - 4*s2**6*s4**3 - 4*s2**5*s3**3*s5 ++ s2**5*s3**2*s4**2 - 99*s2**5*s4*s5**2 - 150*s2**4*s3**2*s5**2 + 196*s2**4*s3*s4**2*s5 ++ 48*s2**4*s4**4 + 12*s2**3*s3**3*s4*s5 - 128*s2**3*s3**2*s4**3 + 1200*s2**3*s4**2*s5**2 +- 12*s2**2*s3**5*s5 + 65*s2**2*s3**4*s4**2 - 725*s2**2*s3**2*s4*s5**2 - 160*s2**2*s3*s4**3*s5 +- 192*s2**2*s4**5 + 3125*s2**2*s5**4 - 13*s2*s3**6*s4 - 125*s2*s3**4*s5**2 + 590*s2*s3**3*s4**2*s5 +- 16*s2*s3**2*s4**4 - 1250*s2*s3*s4*s5**3 - 2000*s2*s4**3*s5**2 + s3**8 - 124*s3**5*s4*s5 ++ 17*s3**4*s4**3 + 3250*s3**2*s4**2*s5**2 - 1600*s3*s4**4*s5 + 256*s4**6 - 9375*s4*s5**4) + ], + (6, 1): [ + lambda s1, s2, s3, s4, s5, s6: (8*s1*s5 - 2*s2*s4 - 18*s6), + lambda s1, s2, s3, s4, s5, s6: (-50*s1**2*s4*s6 + 40*s1**2*s5**2 + 30*s1*s2*s3*s6 - 14*s1*s2*s4*s5 - 6*s1*s3**2*s5 ++ 2*s1*s3*s4**2 - 30*s1*s5*s6 - 8*s2**3*s6 + 2*s2**2*s3*s5 + s2**2*s4**2 + 114*s2*s4*s6 +- 50*s2*s5**2 - 54*s3**2*s6 + 30*s3*s4*s5 - 8*s4**3 - 135*s6**2), + lambda s1, s2, s3, s4, s5, s6: (125*s1**3*s3*s6**2 - 400*s1**3*s4*s5*s6 + 160*s1**3*s5**3 - 50*s1**2*s2**2*s6**2 + +190*s1**2*s2*s3*s5*s6 + 120*s1**2*s2*s4**2*s6 - 80*s1**2*s2*s4*s5**2 - 15*s1**2*s3**2*s4*s6 +- 40*s1**2*s3**2*s5**2 + 21*s1**2*s3*s4**2*s5 - 2*s1**2*s4**4 + 900*s1**2*s4*s6**2 +- 80*s1**2*s5**2*s6 - 44*s1*s2**3*s5*s6 - 66*s1*s2**2*s3*s4*s6 + 21*s1*s2**2*s3*s5**2 ++ 6*s1*s2**2*s4**2*s5 + 9*s1*s2*s3**3*s6 + 5*s1*s2*s3**2*s4*s5 - 2*s1*s2*s3*s4**3 +- 990*s1*s2*s3*s6**2 + 920*s1*s2*s4*s5*s6 - 400*s1*s2*s5**3 - 135*s1*s3**2*s5*s6 - +126*s1*s3*s4**2*s6 + 190*s1*s3*s4*s5**2 - 44*s1*s4**3*s5 - 2070*s1*s5*s6**2 + 16*s2**4*s4*s6 +- 2*s2**4*s5**2 - 2*s2**3*s3**2*s6 - 2*s2**3*s3*s4*s5 + 304*s2**3*s6**2 - 126*s2**2*s3*s5*s6 +- 232*s2**2*s4**2*s6 + 120*s2**2*s4*s5**2 + 198*s2*s3**2*s4*s6 - 15*s2*s3**2*s5**2 +- 66*s2*s3*s4**2*s5 + 16*s2*s4**4 - 1440*s2*s4*s6**2 + 900*s2*s5**2*s6 - 27*s3**4*s6 ++ 9*s3**3*s4*s5 - 2*s3**2*s4**3 + 1350*s3**2*s6**2 - 990*s3*s4*s5*s6 + 125*s3*s5**3 ++ 304*s4**3*s6 - 50*s4**2*s5**2 + 3240*s6**3), + lambda s1, s2, s3, s4, s5, s6: (500*s1**4*s3*s5*s6**2 + 625*s1**4*s4**2*s6**2 - 1400*s1**4*s4*s5**2*s6 + 400*s1**4*s5**4 +- 200*s1**3*s2**2*s5*s6**2 - 875*s1**3*s2*s3*s4*s6**2 + 640*s1**3*s2*s3*s5**2*s6 + +630*s1**3*s2*s4**2*s5*s6 - 264*s1**3*s2*s4*s5**3 + 90*s1**3*s3**2*s4*s5*s6 - 136*s1**3*s3**2*s5**3 +- 50*s1**3*s3*s4**3*s6 + 76*s1**3*s3*s4**2*s5**2 - 1125*s1**3*s3*s6**3 - 8*s1**3*s4**4*s5 ++ 2550*s1**3*s4*s5*s6**2 - 200*s1**3*s5**3*s6 + 250*s1**2*s2**3*s4*s6**2 - 144*s1**2*s2**3*s5**2*s6 ++ 225*s1**2*s2**2*s3**2*s6**2 - 354*s1**2*s2**2*s3*s4*s5*s6 + 76*s1**2*s2**2*s3*s5**3 +- 70*s1**2*s2**2*s4**3*s6 + 41*s1**2*s2**2*s4**2*s5**2 + 450*s1**2*s2**2*s6**3 - 54*s1**2*s2*s3**3*s5*s6 ++ 45*s1**2*s2*s3**2*s4**2*s6 + 30*s1**2*s2*s3**2*s4*s5**2 - 19*s1**2*s2*s3*s4**3*s5 +- 2880*s1**2*s2*s3*s5*s6**2 + 2*s1**2*s2*s4**5 - 3480*s1**2*s2*s4**2*s6**2 + 4692*s1**2*s2*s4*s5**2*s6 +- 1400*s1**2*s2*s5**4 + 9*s1**2*s3**4*s5**2 - 6*s1**2*s3**3*s4**2*s5 + s1**2*s3**2*s4**4 ++ 1485*s1**2*s3**2*s4*s6**2 - 522*s1**2*s3**2*s5**2*s6 - 1257*s1**2*s3*s4**2*s5*s6 ++ 640*s1**2*s3*s4*s5**3 + 218*s1**2*s4**4*s6 - 144*s1**2*s4**3*s5**2 + 1350*s1**2*s4*s6**3 +- 5175*s1**2*s5**2*s6**2 - 120*s1*s2**4*s3*s6**2 + 68*s1*s2**4*s4*s5*s6 - 8*s1*s2**4*s5**3 ++ 46*s1*s2**3*s3**2*s5*s6 + 28*s1*s2**3*s3*s4**2*s6 - 19*s1*s2**3*s3*s4*s5**2 + 868*s1*s2**3*s5*s6**2 +- 9*s1*s2**2*s3**3*s4*s6 - 6*s1*s2**2*s3**3*s5**2 + 3*s1*s2**2*s3**2*s4**2*s5 + 2484*s1*s2**2*s3*s4*s6**2 +- 1257*s1*s2**2*s3*s5**2*s6 - 1356*s1*s2**2*s4**2*s5*s6 + 630*s1*s2**2*s4*s5**3 - +891*s1*s2*s3**3*s6**2 + 882*s1*s2*s3**2*s4*s5*s6 + 90*s1*s2*s3**2*s5**3 + 84*s1*s2*s3*s4**3*s6 +- 354*s1*s2*s3*s4**2*s5**2 + 3240*s1*s2*s3*s6**3 + 68*s1*s2*s4**4*s5 - 4392*s1*s2*s4*s5*s6**2 ++ 2550*s1*s2*s5**3*s6 + 54*s1*s3**4*s5*s6 - 54*s1*s3**3*s4**2*s6 - 54*s1*s3**3*s4*s5**2 ++ 46*s1*s3**2*s4**3*s5 + 2727*s1*s3**2*s5*s6**2 - 8*s1*s3*s4**5 + 756*s1*s3*s4**2*s6**2 +- 2880*s1*s3*s4*s5**2*s6 + 500*s1*s3*s5**4 + 868*s1*s4**3*s5*s6 - 200*s1*s4**2*s5**3 ++ 8100*s1*s5*s6**3 + 16*s2**6*s6**2 - 8*s2**5*s3*s5*s6 - 8*s2**5*s4**2*s6 + 2*s2**5*s4*s5**2 ++ 2*s2**4*s3**2*s4*s6 + s2**4*s3**2*s5**2 - 688*s2**4*s4*s6**2 + 218*s2**4*s5**2*s6 ++ 234*s2**3*s3**2*s6**2 + 84*s2**3*s3*s4*s5*s6 - 50*s2**3*s3*s5**3 + 168*s2**3*s4**3*s6 +- 70*s2**3*s4**2*s5**2 - 1224*s2**3*s6**3 - 54*s2**2*s3**3*s5*s6 - 144*s2**2*s3**2*s4**2*s6 ++ 45*s2**2*s3**2*s4*s5**2 + 28*s2**2*s3*s4**3*s5 + 756*s2**2*s3*s5*s6**2 - 8*s2**2*s4**5 ++ 4320*s2**2*s4**2*s6**2 - 3480*s2**2*s4*s5**2*s6 + 625*s2**2*s5**4 + 27*s2*s3**4*s4*s6 +- 9*s2*s3**3*s4**2*s5 + 2*s2*s3**2*s4**4 - 4752*s2*s3**2*s4*s6**2 + 1485*s2*s3**2*s5**2*s6 ++ 2484*s2*s3*s4**2*s5*s6 - 875*s2*s3*s4*s5**3 - 688*s2*s4**4*s6 + 250*s2*s4**3*s5**2 +- 4536*s2*s4*s6**3 + 1350*s2*s5**2*s6**2 + 972*s3**4*s6**2 - 891*s3**3*s4*s5*s6 + +234*s3**2*s4**3*s6 + 225*s3**2*s4**2*s5**2 - 1944*s3**2*s6**3 - 120*s3*s4**4*s5 + +3240*s3*s4*s5*s6**2 - 1125*s3*s5**3*s6 + 16*s4**6 - 1224*s4**3*s6**2 + 450*s4**2*s5**2*s6), + lambda s1, s2, s3, s4, s5, s6: (-3125*s1**6*s6**4 + 2500*s1**5*s2*s5*s6**3 + 625*s1**5*s3*s4*s6**3 - 500*s1**5*s3*s5**2*s6**2 ++ 2750*s1**5*s4**2*s5*s6**2 - 2400*s1**5*s4*s5**3*s6 + 512*s1**5*s5**5 - 750*s1**4*s2**2*s4*s6**3 +- 550*s1**4*s2**2*s5**2*s6**2 - 375*s1**4*s2*s3**2*s6**3 - 3075*s1**4*s2*s3*s4*s5*s6**2 ++ 1640*s1**4*s2*s3*s5**3*s6 - 850*s1**4*s2*s4**3*s6**2 + 1220*s1**4*s2*s4**2*s5**2*s6 +- 384*s1**4*s2*s4*s5**4 + 22500*s1**4*s2*s6**4 + 525*s1**4*s3**3*s5*s6**2 - 325*s1**4*s3**2*s4**2*s6**2 ++ 260*s1**4*s3**2*s4*s5**2*s6 - 256*s1**4*s3**2*s5**4 + 105*s1**4*s3*s4**3*s5*s6 + +76*s1**4*s3*s4**2*s5**3 + 375*s1**4*s3*s5*s6**3 - 58*s1**4*s4**5*s6 + 3*s1**4*s4**4*s5**2 +- 12750*s1**4*s4**2*s6**3 + 3700*s1**4*s4*s5**2*s6**2 + 640*s1**4*s5**4*s6 + 350*s1**3*s2**3*s3*s6**3 ++ 1090*s1**3*s2**3*s4*s5*s6**2 - 364*s1**3*s2**3*s5**3*s6 + 305*s1**3*s2**2*s3**2*s5*s6**2 ++ 1340*s1**3*s2**2*s3*s4**2*s6**2 - 901*s1**3*s2**2*s3*s4*s5**2*s6 + 76*s1**3*s2**2*s3*s5**4 +- 234*s1**3*s2**2*s4**3*s5*s6 + 102*s1**3*s2**2*s4**2*s5**3 - 16650*s1**3*s2**2*s5*s6**3 ++ 180*s1**3*s2*s3**3*s4*s6**2 - 366*s1**3*s2*s3**3*s5**2*s6 - 231*s1**3*s2*s3**2*s4**2*s5*s6 ++ 212*s1**3*s2*s3**2*s4*s5**3 + 112*s1**3*s2*s3*s4**4*s6 - 89*s1**3*s2*s3*s4**3*s5**2 ++ 10950*s1**3*s2*s3*s4*s6**3 + 1555*s1**3*s2*s3*s5**2*s6**2 + 6*s1**3*s2*s4**5*s5 +- 9540*s1**3*s2*s4**2*s5*s6**2 + 9016*s1**3*s2*s4*s5**3*s6 - 2400*s1**3*s2*s5**5 - +108*s1**3*s3**5*s6**2 + 117*s1**3*s3**4*s4*s5*s6 + 32*s1**3*s3**4*s5**3 - 31*s1**3*s3**3*s4**3*s6 +- 51*s1**3*s3**3*s4**2*s5**2 - 2025*s1**3*s3**3*s6**3 + 19*s1**3*s3**2*s4**4*s5 + +2955*s1**3*s3**2*s4*s5*s6**2 - 1436*s1**3*s3**2*s5**3*s6 - 2*s1**3*s3*s4**6 + 2770*s1**3*s3*s4**3*s6**2 +- 5123*s1**3*s3*s4**2*s5**2*s6 + 1640*s1**3*s3*s4*s5**4 - 40500*s1**3*s3*s6**4 + 914*s1**3*s4**4*s5*s6 +- 364*s1**3*s4**3*s5**3 + 53550*s1**3*s4*s5*s6**3 - 17930*s1**3*s5**3*s6**2 - 56*s1**2*s2**5*s6**3 +- 318*s1**2*s2**4*s3*s5*s6**2 - 352*s1**2*s2**4*s4**2*s6**2 + 166*s1**2*s2**4*s4*s5**2*s6 ++ 3*s1**2*s2**4*s5**4 - 574*s1**2*s2**3*s3**2*s4*s6**2 + 347*s1**2*s2**3*s3**2*s5**2*s6 ++ 194*s1**2*s2**3*s3*s4**2*s5*s6 - 89*s1**2*s2**3*s3*s4*s5**3 - 8*s1**2*s2**3*s4**4*s6 ++ 4*s1**2*s2**3*s4**3*s5**2 + 560*s1**2*s2**3*s4*s6**3 + 3662*s1**2*s2**3*s5**2*s6**2 ++ 162*s1**2*s2**2*s3**4*s6**2 + 33*s1**2*s2**2*s3**3*s4*s5*s6 - 51*s1**2*s2**2*s3**3*s5**3 +- 32*s1**2*s2**2*s3**2*s4**3*s6 + 28*s1**2*s2**2*s3**2*s4**2*s5**2 + 270*s1**2*s2**2*s3**2*s6**3 +- 2*s1**2*s2**2*s3*s4**4*s5 + 4872*s1**2*s2**2*s3*s4*s5*s6**2 - 5123*s1**2*s2**2*s3*s5**3*s6 ++ 2144*s1**2*s2**2*s4**3*s6**2 - 2812*s1**2*s2**2*s4**2*s5**2*s6 + 1220*s1**2*s2**2*s4*s5**4 +- 37800*s1**2*s2**2*s6**4 - 27*s1**2*s2*s3**5*s5*s6 + 9*s1**2*s2*s3**4*s4**2*s6 + +3*s1**2*s2*s3**4*s4*s5**2 - s1**2*s2*s3**3*s4**3*s5 - 3078*s1**2*s2*s3**3*s5*s6**2 +- 4014*s1**2*s2*s3**2*s4**2*s6**2 + 5412*s1**2*s2*s3**2*s4*s5**2*s6 + 260*s1**2*s2*s3**2*s5**4 +- 310*s1**2*s2*s3*s4**3*s5*s6 - 901*s1**2*s2*s3*s4**2*s5**3 - 3780*s1**2*s2*s3*s5*s6**3 ++ 166*s1**2*s2*s4**4*s5**2 + 40320*s1**2*s2*s4**2*s6**3 - 25344*s1**2*s2*s4*s5**2*s6**2 ++ 3700*s1**2*s2*s5**4*s6 + 918*s1**2*s3**4*s4*s6**2 + 27*s1**2*s3**4*s5**2*s6 - 342*s1**2*s3**3*s4**2*s5*s6 +- 366*s1**2*s3**3*s4*s5**3 + 32*s1**2*s3**2*s4**4*s6 + 347*s1**2*s3**2*s4**3*s5**2 +- 4590*s1**2*s3**2*s4*s6**3 + 594*s1**2*s3**2*s5**2*s6**2 - 94*s1**2*s3*s4**5*s5 + +3618*s1**2*s3*s4**2*s5*s6**2 + 1555*s1**2*s3*s4*s5**3*s6 - 500*s1**2*s3*s5**5 + 8*s1**2*s4**7 +- 7192*s1**2*s4**4*s6**2 + 3662*s1**2*s4**3*s5**2*s6 - 550*s1**2*s4**2*s5**4 - 48600*s1**2*s4*s6**4 ++ 1080*s1**2*s5**2*s6**3 + 48*s1*s2**6*s5*s6**2 + 264*s1*s2**5*s3*s4*s6**2 - 94*s1*s2**5*s3*s5**2*s6 +- 24*s1*s2**5*s4**2*s5*s6 + 6*s1*s2**5*s4*s5**3 - 66*s1*s2**4*s3**3*s6**2 - 50*s1*s2**4*s3**2*s4*s5*s6 ++ 19*s1*s2**4*s3**2*s5**3 + 8*s1*s2**4*s3*s4**3*s6 - 2*s1*s2**4*s3*s4**2*s5**2 - 552*s1*s2**4*s3*s6**3 +- 2560*s1*s2**4*s4*s5*s6**2 + 914*s1*s2**4*s5**3*s6 + 15*s1*s2**3*s3**4*s5*s6 - 2*s1*s2**3*s3**3*s4**2*s6 +- s1*s2**3*s3**3*s4*s5**2 + 1602*s1*s2**3*s3**2*s5*s6**2 - 608*s1*s2**3*s3*s4**2*s6**2 +- 310*s1*s2**3*s3*s4*s5**2*s6 + 105*s1*s2**3*s3*s5**4 + 600*s1*s2**3*s4**3*s5*s6 - +234*s1*s2**3*s4**2*s5**3 + 31368*s1*s2**3*s5*s6**3 + 756*s1*s2**2*s3**3*s4*s6**2 - +342*s1*s2**2*s3**3*s5**2*s6 + 216*s1*s2**2*s3**2*s4**2*s5*s6 - 231*s1*s2**2*s3**2*s4*s5**3 +- 192*s1*s2**2*s3*s4**4*s6 + 194*s1*s2**2*s3*s4**3*s5**2 - 39096*s1*s2**2*s3*s4*s6**3 ++ 3618*s1*s2**2*s3*s5**2*s6**2 - 24*s1*s2**2*s4**5*s5 + 9408*s1*s2**2*s4**2*s5*s6**2 +- 9540*s1*s2**2*s4*s5**3*s6 + 2750*s1*s2**2*s5**5 - 162*s1*s2*s3**5*s6**2 - 378*s1*s2*s3**4*s4*s5*s6 ++ 117*s1*s2*s3**4*s5**3 + 150*s1*s2*s3**3*s4**3*s6 + 33*s1*s2*s3**3*s4**2*s5**2 + +10044*s1*s2*s3**3*s6**3 - 50*s1*s2*s3**2*s4**4*s5 - 8640*s1*s2*s3**2*s4*s5*s6**2 + +2955*s1*s2*s3**2*s5**3*s6 + 8*s1*s2*s3*s4**6 + 6144*s1*s2*s3*s4**3*s6**2 + 4872*s1*s2*s3*s4**2*s5**2*s6 +- 3075*s1*s2*s3*s4*s5**4 + 174960*s1*s2*s3*s6**4 - 2560*s1*s2*s4**4*s5*s6 + 1090*s1*s2*s4**3*s5**3 +- 148824*s1*s2*s4*s5*s6**3 + 53550*s1*s2*s5**3*s6**2 + 81*s1*s3**6*s5*s6 - 27*s1*s3**5*s4**2*s6 +- 27*s1*s3**5*s4*s5**2 + 15*s1*s3**4*s4**3*s5 + 2430*s1*s3**4*s5*s6**2 - 2*s1*s3**3*s4**5 +- 2052*s1*s3**3*s4**2*s6**2 - 3078*s1*s3**3*s4*s5**2*s6 + 525*s1*s3**3*s5**4 + 1602*s1*s3**2*s4**3*s5*s6 ++ 305*s1*s3**2*s4**2*s5**3 + 18144*s1*s3**2*s5*s6**3 - 104*s1*s3*s4**5*s6 - 318*s1*s3*s4**4*s5**2 +- 33696*s1*s3*s4**2*s6**3 - 3780*s1*s3*s4*s5**2*s6**2 + 375*s1*s3*s5**4*s6 + 48*s1*s4**6*s5 ++ 31368*s1*s4**3*s5*s6**2 - 16650*s1*s4**2*s5**3*s6 + 2500*s1*s4*s5**5 + 77760*s1*s5*s6**4 +- 32*s2**7*s4*s6**2 + 8*s2**7*s5**2*s6 + 8*s2**6*s3**2*s6**2 + 8*s2**6*s3*s4*s5*s6 +- 2*s2**6*s3*s5**3 + 96*s2**6*s6**3 - 2*s2**5*s3**3*s5*s6 - 104*s2**5*s3*s5*s6**2 ++ 416*s2**5*s4**2*s6**2 - 58*s2**5*s5**4 - 312*s2**4*s3**2*s4*s6**2 + 32*s2**4*s3**2*s5**2*s6 +- 192*s2**4*s3*s4**2*s5*s6 + 112*s2**4*s3*s4*s5**3 - 8*s2**4*s4**3*s5**2 + 4224*s2**4*s4*s6**3 +- 7192*s2**4*s5**2*s6**2 + 54*s2**3*s3**4*s6**2 + 150*s2**3*s3**3*s4*s5*s6 - 31*s2**3*s3**3*s5**3 +- 32*s2**3*s3**2*s4**2*s5**2 - 864*s2**3*s3**2*s6**3 + 8*s2**3*s3*s4**4*s5 + 6144*s2**3*s3*s4*s5*s6**2 ++ 2770*s2**3*s3*s5**3*s6 - 4032*s2**3*s4**3*s6**2 + 2144*s2**3*s4**2*s5**2*s6 - 850*s2**3*s4*s5**4 +- 16416*s2**3*s6**4 - 27*s2**2*s3**5*s5*s6 + 9*s2**2*s3**4*s4*s5**2 - 2*s2**2*s3**3*s4**3*s5 +- 2052*s2**2*s3**3*s5*s6**2 + 2376*s2**2*s3**2*s4**2*s6**2 - 4014*s2**2*s3**2*s4*s5**2*s6 +- 325*s2**2*s3**2*s5**4 - 608*s2**2*s3*s4**3*s5*s6 + 1340*s2**2*s3*s4**2*s5**3 - 33696*s2**2*s3*s5*s6**3 ++ 416*s2**2*s4**5*s6 - 352*s2**2*s4**4*s5**2 - 6048*s2**2*s4**2*s6**3 + 40320*s2**2*s4*s5**2*s6**2 +- 12750*s2**2*s5**4*s6 - 324*s2*s3**4*s4*s6**2 + 918*s2*s3**4*s5**2*s6 + 756*s2*s3**3*s4**2*s5*s6 ++ 180*s2*s3**3*s4*s5**3 - 312*s2*s3**2*s4**4*s6 - 574*s2*s3**2*s4**3*s5**2 + 43416*s2*s3**2*s4*s6**3 +- 4590*s2*s3**2*s5**2*s6**2 + 264*s2*s3*s4**5*s5 - 39096*s2*s3*s4**2*s5*s6**2 + 10950*s2*s3*s4*s5**3*s6 ++ 625*s2*s3*s5**5 - 32*s2*s4**7 + 4224*s2*s4**4*s6**2 + 560*s2*s4**3*s5**2*s6 - 750*s2*s4**2*s5**4 ++ 85536*s2*s4*s6**4 - 48600*s2*s5**2*s6**3 - 162*s3**5*s4*s5*s6 - 108*s3**5*s5**3 ++ 54*s3**4*s4**3*s6 + 162*s3**4*s4**2*s5**2 - 11664*s3**4*s6**3 - 66*s3**3*s4**4*s5 ++ 10044*s3**3*s4*s5*s6**2 - 2025*s3**3*s5**3*s6 + 8*s3**2*s4**6 - 864*s3**2*s4**3*s6**2 ++ 270*s3**2*s4**2*s5**2*s6 - 375*s3**2*s4*s5**4 - 163296*s3**2*s6**4 - 552*s3*s4**4*s5*s6 ++ 350*s3*s4**3*s5**3 + 174960*s3*s4*s5*s6**3 - 40500*s3*s5**3*s6**2 + 96*s4**6*s6 +- 56*s4**5*s5**2 - 16416*s4**3*s6**3 - 37800*s4**2*s5**2*s6**2 + 22500*s4*s5**4*s6 +- 3125*s5**6 - 93312*s6**5), + lambda s1, s2, s3, s4, s5, s6: (-9375*s1**7*s5*s6**4 + 3125*s1**6*s2*s4*s6**4 + 7500*s1**6*s2*s5**2*s6**3 + 3125*s1**6*s3**2*s6**4 +- 1250*s1**6*s3*s4*s5*s6**3 - 2000*s1**6*s3*s5**3*s6**2 + 3250*s1**6*s4**2*s5**2*s6**2 +- 1600*s1**6*s4*s5**4*s6 + 256*s1**6*s5**6 + 40625*s1**6*s6**5 - 3125*s1**5*s2**2*s3*s6**4 +- 3500*s1**5*s2**2*s4*s5*s6**3 - 1450*s1**5*s2**2*s5**3*s6**2 - 1750*s1**5*s2*s3**2*s5*s6**3 ++ 625*s1**5*s2*s3*s4**2*s6**3 - 850*s1**5*s2*s3*s4*s5**2*s6**2 + 1760*s1**5*s2*s3*s5**4*s6 +- 2050*s1**5*s2*s4**3*s5*s6**2 + 780*s1**5*s2*s4**2*s5**3*s6 - 192*s1**5*s2*s4*s5**5 ++ 35000*s1**5*s2*s5*s6**4 + 1200*s1**5*s3**3*s5**2*s6**2 - 725*s1**5*s3**2*s4**2*s5*s6**2 +- 160*s1**5*s3**2*s4*s5**3*s6 - 192*s1**5*s3**2*s5**5 - 125*s1**5*s3*s4**4*s6**2 + +590*s1**5*s3*s4**3*s5**2*s6 - 16*s1**5*s3*s4**2*s5**4 - 20625*s1**5*s3*s4*s6**4 + +17250*s1**5*s3*s5**2*s6**3 - 124*s1**5*s4**5*s5*s6 + 17*s1**5*s4**4*s5**3 - 20250*s1**5*s4**2*s5*s6**3 ++ 1900*s1**5*s4*s5**3*s6**2 + 1344*s1**5*s5**5*s6 + 625*s1**4*s2**4*s6**4 + 2300*s1**4*s2**3*s3*s5*s6**3 ++ 250*s1**4*s2**3*s4**2*s6**3 + 1470*s1**4*s2**3*s4*s5**2*s6**2 - 276*s1**4*s2**3*s5**4*s6 +- 125*s1**4*s2**2*s3**2*s4*s6**3 - 610*s1**4*s2**2*s3**2*s5**2*s6**2 + 1995*s1**4*s2**2*s3*s4**2*s5*s6**2 +- 1174*s1**4*s2**2*s3*s4*s5**3*s6 - 16*s1**4*s2**2*s3*s5**5 + 375*s1**4*s2**2*s4**4*s6**2 +- 172*s1**4*s2**2*s4**3*s5**2*s6 + 82*s1**4*s2**2*s4**2*s5**4 - 7750*s1**4*s2**2*s4*s6**4 +- 46650*s1**4*s2**2*s5**2*s6**3 + 15*s1**4*s2*s3**3*s4*s5*s6**2 - 384*s1**4*s2*s3**3*s5**3*s6 ++ 525*s1**4*s2*s3**2*s4**3*s6**2 - 528*s1**4*s2*s3**2*s4**2*s5**2*s6 + 384*s1**4*s2*s3**2*s4*s5**4 +- 10125*s1**4*s2*s3**2*s6**4 - 29*s1**4*s2*s3*s4**4*s5*s6 - 118*s1**4*s2*s3*s4**3*s5**3 ++ 36700*s1**4*s2*s3*s4*s5*s6**3 + 2410*s1**4*s2*s3*s5**3*s6**2 + 38*s1**4*s2*s4**6*s6 ++ 5*s1**4*s2*s4**5*s5**2 + 5550*s1**4*s2*s4**3*s6**3 - 10040*s1**4*s2*s4**2*s5**2*s6**2 ++ 5800*s1**4*s2*s4*s5**4*s6 - 1600*s1**4*s2*s5**6 - 292500*s1**4*s2*s6**5 - 99*s1**4*s3**5*s5*s6**2 +- 150*s1**4*s3**4*s4**2*s6**2 + 196*s1**4*s3**4*s4*s5**2*s6 + 48*s1**4*s3**4*s5**4 ++ 12*s1**4*s3**3*s4**3*s5*s6 - 128*s1**4*s3**3*s4**2*s5**3 - 6525*s1**4*s3**3*s5*s6**3 +- 12*s1**4*s3**2*s4**5*s6 + 65*s1**4*s3**2*s4**4*s5**2 + 225*s1**4*s3**2*s4**2*s6**3 ++ 80*s1**4*s3**2*s4*s5**2*s6**2 - 13*s1**4*s3*s4**6*s5 + 5145*s1**4*s3*s4**3*s5*s6**2 +- 6746*s1**4*s3*s4**2*s5**3*s6 + 1760*s1**4*s3*s4*s5**5 - 103500*s1**4*s3*s5*s6**4 ++ s1**4*s4**8 + 954*s1**4*s4**5*s6**2 + 449*s1**4*s4**4*s5**2*s6 - 276*s1**4*s4**3*s5**4 ++ 70125*s1**4*s4**2*s6**4 + 58900*s1**4*s4*s5**2*s6**3 - 23310*s1**4*s5**4*s6**2 - +468*s1**3*s2**5*s5*s6**3 - 200*s1**3*s2**4*s3*s4*s6**3 - 294*s1**3*s2**4*s3*s5**2*s6**2 +- 676*s1**3*s2**4*s4**2*s5*s6**2 + 180*s1**3*s2**4*s4*s5**3*s6 + 17*s1**3*s2**4*s5**5 ++ 50*s1**3*s2**3*s3**3*s6**3 - 397*s1**3*s2**3*s3**2*s4*s5*s6**2 + 514*s1**3*s2**3*s3**2*s5**3*s6 +- 700*s1**3*s2**3*s3*s4**3*s6**2 + 447*s1**3*s2**3*s3*s4**2*s5**2*s6 - 118*s1**3*s2**3*s3*s4*s5**4 ++ 11700*s1**3*s2**3*s3*s6**4 - 12*s1**3*s2**3*s4**4*s5*s6 + 6*s1**3*s2**3*s4**3*s5**3 ++ 10360*s1**3*s2**3*s4*s5*s6**3 + 11404*s1**3*s2**3*s5**3*s6**2 + 141*s1**3*s2**2*s3**4*s5*s6**2 +- 185*s1**3*s2**2*s3**3*s4**2*s6**2 + 168*s1**3*s2**2*s3**3*s4*s5**2*s6 - 128*s1**3*s2**2*s3**3*s5**4 ++ 93*s1**3*s2**2*s3**2*s4**3*s5*s6 + 19*s1**3*s2**2*s3**2*s4**2*s5**3 + 5895*s1**3*s2**2*s3**2*s5*s6**3 +- 36*s1**3*s2**2*s3*s4**5*s6 + 5*s1**3*s2**2*s3*s4**4*s5**2 - 12020*s1**3*s2**2*s3*s4**2*s6**3 +- 5698*s1**3*s2**2*s3*s4*s5**2*s6**2 - 6746*s1**3*s2**2*s3*s5**4*s6 + 5064*s1**3*s2**2*s4**3*s5*s6**2 +- 762*s1**3*s2**2*s4**2*s5**3*s6 + 780*s1**3*s2**2*s4*s5**5 + 93900*s1**3*s2**2*s5*s6**4 ++ 198*s1**3*s2*s3**5*s4*s6**2 - 78*s1**3*s2*s3**5*s5**2*s6 - 95*s1**3*s2*s3**4*s4**2*s5*s6 ++ 44*s1**3*s2*s3**4*s4*s5**3 + 25*s1**3*s2*s3**3*s4**4*s6 - 15*s1**3*s2*s3**3*s4**3*s5**2 ++ 1935*s1**3*s2*s3**3*s4*s6**3 - 2808*s1**3*s2*s3**3*s5**2*s6**2 + s1**3*s2*s3**2*s4**5*s5 +- 4844*s1**3*s2*s3**2*s4**2*s5*s6**2 + 8996*s1**3*s2*s3**2*s4*s5**3*s6 - 160*s1**3*s2*s3**2*s5**5 +- 3616*s1**3*s2*s3*s4**4*s6**2 + 500*s1**3*s2*s3*s4**3*s5**2*s6 - 1174*s1**3*s2*s3*s4**2*s5**4 ++ 72900*s1**3*s2*s3*s4*s6**4 - 55665*s1**3*s2*s3*s5**2*s6**3 + 128*s1**3*s2*s4**5*s5*s6 ++ 180*s1**3*s2*s4**4*s5**3 + 16240*s1**3*s2*s4**2*s5*s6**3 - 9330*s1**3*s2*s4*s5**3*s6**2 ++ 1900*s1**3*s2*s5**5*s6 - 27*s1**3*s3**7*s6**2 + 18*s1**3*s3**6*s4*s5*s6 - 4*s1**3*s3**6*s5**3 +- 4*s1**3*s3**5*s4**3*s6 + s1**3*s3**5*s4**2*s5**2 + 54*s1**3*s3**5*s6**3 + 1143*s1**3*s3**4*s4*s5*s6**2 +- 820*s1**3*s3**4*s5**3*s6 + 923*s1**3*s3**3*s4**3*s6**2 + 57*s1**3*s3**3*s4**2*s5**2*s6 +- 384*s1**3*s3**3*s4*s5**4 + 29700*s1**3*s3**3*s6**4 - 547*s1**3*s3**2*s4**4*s5*s6 ++ 514*s1**3*s3**2*s4**3*s5**3 - 10305*s1**3*s3**2*s4*s5*s6**3 - 7405*s1**3*s3**2*s5**3*s6**2 ++ 108*s1**3*s3*s4**6*s6 - 148*s1**3*s3*s4**5*s5**2 - 11360*s1**3*s3*s4**3*s6**3 + +22209*s1**3*s3*s4**2*s5**2*s6**2 + 2410*s1**3*s3*s4*s5**4*s6 - 2000*s1**3*s3*s5**6 ++ 432000*s1**3*s3*s6**5 + 12*s1**3*s4**7*s5 - 22624*s1**3*s4**4*s5*s6**2 + 11404*s1**3*s4**3*s5**3*s6 +- 1450*s1**3*s4**2*s5**5 - 242100*s1**3*s4*s5*s6**4 + 58430*s1**3*s5**3*s6**3 + 56*s1**2*s2**6*s4*s6**3 ++ 86*s1**2*s2**6*s5**2*s6**2 - 14*s1**2*s2**5*s3**2*s6**3 + 304*s1**2*s2**5*s3*s4*s5*s6**2 +- 148*s1**2*s2**5*s3*s5**3*s6 + 152*s1**2*s2**5*s4**3*s6**2 - 54*s1**2*s2**5*s4**2*s5**2*s6 ++ 5*s1**2*s2**5*s4*s5**4 - 2472*s1**2*s2**5*s6**4 - 76*s1**2*s2**4*s3**3*s5*s6**2 ++ 370*s1**2*s2**4*s3**2*s4**2*s6**2 - 287*s1**2*s2**4*s3**2*s4*s5**2*s6 + 65*s1**2*s2**4*s3**2*s5**4 +- 28*s1**2*s2**4*s3*s4**3*s5*s6 + 5*s1**2*s2**4*s3*s4**2*s5**3 - 8092*s1**2*s2**4*s3*s5*s6**3 ++ 8*s1**2*s2**4*s4**5*s6 - 2*s1**2*s2**4*s4**4*s5**2 + 1096*s1**2*s2**4*s4**2*s6**3 +- 5144*s1**2*s2**4*s4*s5**2*s6**2 + 449*s1**2*s2**4*s5**4*s6 - 210*s1**2*s2**3*s3**4*s4*s6**2 ++ 76*s1**2*s2**3*s3**4*s5**2*s6 + 43*s1**2*s2**3*s3**3*s4**2*s5*s6 - 15*s1**2*s2**3*s3**3*s4*s5**3 +- 6*s1**2*s2**3*s3**2*s4**4*s6 + 2*s1**2*s2**3*s3**2*s4**3*s5**2 + 1962*s1**2*s2**3*s3**2*s4*s6**3 ++ 3181*s1**2*s2**3*s3**2*s5**2*s6**2 + 1684*s1**2*s2**3*s3*s4**2*s5*s6**2 + 500*s1**2*s2**3*s3*s4*s5**3*s6 ++ 590*s1**2*s2**3*s3*s5**5 - 168*s1**2*s2**3*s4**4*s6**2 - 494*s1**2*s2**3*s4**3*s5**2*s6 +- 172*s1**2*s2**3*s4**2*s5**4 - 22080*s1**2*s2**3*s4*s6**4 + 58894*s1**2*s2**3*s5**2*s6**3 ++ 27*s1**2*s2**2*s3**6*s6**2 - 9*s1**2*s2**2*s3**5*s4*s5*s6 + s1**2*s2**2*s3**5*s5**3 ++ s1**2*s2**2*s3**4*s4**3*s6 - 486*s1**2*s2**2*s3**4*s6**3 + 1071*s1**2*s2**2*s3**3*s4*s5*s6**2 ++ 57*s1**2*s2**2*s3**3*s5**3*s6 + 2262*s1**2*s2**2*s3**2*s4**3*s6**2 - 2742*s1**2*s2**2*s3**2*s4**2*s5**2*s6 +- 528*s1**2*s2**2*s3**2*s4*s5**4 - 29160*s1**2*s2**2*s3**2*s6**4 + 772*s1**2*s2**2*s3*s4**4*s5*s6 ++ 447*s1**2*s2**2*s3*s4**3*s5**3 - 96732*s1**2*s2**2*s3*s4*s5*s6**3 + 22209*s1**2*s2**2*s3*s5**3*s6**2 +- 160*s1**2*s2**2*s4**6*s6 - 54*s1**2*s2**2*s4**5*s5**2 - 7992*s1**2*s2**2*s4**3*s6**3 ++ 8634*s1**2*s2**2*s4**2*s5**2*s6**2 - 10040*s1**2*s2**2*s4*s5**4*s6 + 3250*s1**2*s2**2*s5**6 ++ 529200*s1**2*s2**2*s6**5 - 351*s1**2*s2*s3**5*s5*s6**2 - 1215*s1**2*s2*s3**4*s4**2*s6**2 +- 360*s1**2*s2*s3**4*s4*s5**2*s6 + 196*s1**2*s2*s3**4*s5**4 + 741*s1**2*s2*s3**3*s4**3*s5*s6 ++ 168*s1**2*s2*s3**3*s4**2*s5**3 + 11718*s1**2*s2*s3**3*s5*s6**3 - 106*s1**2*s2*s3**2*s4**5*s6 +- 287*s1**2*s2*s3**2*s4**4*s5**2 + 22572*s1**2*s2*s3**2*s4**2*s6**3 - 8892*s1**2*s2*s3**2*s4*s5**2*s6**2 ++ 80*s1**2*s2*s3**2*s5**4*s6 + 88*s1**2*s2*s3*s4**6*s5 + 22144*s1**2*s2*s3*s4**3*s5*s6**2 +- 5698*s1**2*s2*s3*s4**2*s5**3*s6 - 850*s1**2*s2*s3*s4*s5**5 + 169560*s1**2*s2*s3*s5*s6**4 +- 8*s1**2*s2*s4**8 + 3032*s1**2*s2*s4**5*s6**2 - 5144*s1**2*s2*s4**4*s5**2*s6 + 1470*s1**2*s2*s4**3*s5**4 +- 249480*s1**2*s2*s4**2*s6**4 - 105390*s1**2*s2*s4*s5**2*s6**3 + 58900*s1**2*s2*s5**4*s6**2 ++ 162*s1**2*s3**6*s4*s6**2 + 216*s1**2*s3**6*s5**2*s6 - 216*s1**2*s3**5*s4**2*s5*s6 +- 78*s1**2*s3**5*s4*s5**3 + 36*s1**2*s3**4*s4**4*s6 + 76*s1**2*s3**4*s4**3*s5**2 - +3564*s1**2*s3**4*s4*s6**3 + 8802*s1**2*s3**4*s5**2*s6**2 - 22*s1**2*s3**3*s4**5*s5 +- 11475*s1**2*s3**3*s4**2*s5*s6**2 - 2808*s1**2*s3**3*s4*s5**3*s6 + 1200*s1**2*s3**3*s5**5 ++ 2*s1**2*s3**2*s4**7 + 222*s1**2*s3**2*s4**4*s6**2 + 3181*s1**2*s3**2*s4**3*s5**2*s6 +- 610*s1**2*s3**2*s4**2*s5**4 - 165240*s1**2*s3**2*s4*s6**4 + 118260*s1**2*s3**2*s5**2*s6**3 ++ 572*s1**2*s3*s4**5*s5*s6 - 294*s1**2*s3*s4**4*s5**3 - 32616*s1**2*s3*s4**2*s5*s6**3 +- 55665*s1**2*s3*s4*s5**3*s6**2 + 17250*s1**2*s3*s5**5*s6 - 232*s1**2*s4**7*s6 + 86*s1**2*s4**6*s5**2 ++ 48408*s1**2*s4**4*s6**3 + 58894*s1**2*s4**3*s5**2*s6**2 - 46650*s1**2*s4**2*s5**4*s6 ++ 7500*s1**2*s4*s5**6 - 129600*s1**2*s4*s6**5 + 41040*s1**2*s5**2*s6**4 - 48*s1*s2**7*s4*s5*s6**2 ++ 12*s1*s2**7*s5**3*s6 + 12*s1*s2**6*s3**2*s5*s6**2 - 144*s1*s2**6*s3*s4**2*s6**2 ++ 88*s1*s2**6*s3*s4*s5**2*s6 - 13*s1*s2**6*s3*s5**4 + 1680*s1*s2**6*s5*s6**3 + 72*s1*s2**5*s3**3*s4*s6**2 +- 22*s1*s2**5*s3**3*s5**2*s6 - 4*s1*s2**5*s3**2*s4**2*s5*s6 + s1*s2**5*s3**2*s4*s5**3 +- 144*s1*s2**5*s3*s4*s6**3 + 572*s1*s2**5*s3*s5**2*s6**2 + 736*s1*s2**5*s4**2*s5*s6**2 ++ 128*s1*s2**5*s4*s5**3*s6 - 124*s1*s2**5*s5**5 - 9*s1*s2**4*s3**5*s6**2 + s1*s2**4*s3**4*s4*s5*s6 ++ 36*s1*s2**4*s3**3*s6**3 - 2028*s1*s2**4*s3**2*s4*s5*s6**2 - 547*s1*s2**4*s3**2*s5**3*s6 +- 480*s1*s2**4*s3*s4**3*s6**2 + 772*s1*s2**4*s3*s4**2*s5**2*s6 - 29*s1*s2**4*s3*s4*s5**4 ++ 6336*s1*s2**4*s3*s6**4 - 12*s1*s2**4*s4**3*s5**3 + 4368*s1*s2**4*s4*s5*s6**3 - 22624*s1*s2**4*s5**3*s6**2 ++ 441*s1*s2**3*s3**4*s5*s6**2 + 336*s1*s2**3*s3**3*s4**2*s6**2 + 741*s1*s2**3*s3**3*s4*s5**2*s6 ++ 12*s1*s2**3*s3**3*s5**4 - 868*s1*s2**3*s3**2*s4**3*s5*s6 + 93*s1*s2**3*s3**2*s4**2*s5**3 ++ 11016*s1*s2**3*s3**2*s5*s6**3 + 176*s1*s2**3*s3*s4**5*s6 - 28*s1*s2**3*s3*s4**4*s5**2 ++ 14784*s1*s2**3*s3*s4**2*s6**3 + 22144*s1*s2**3*s3*s4*s5**2*s6**2 + 5145*s1*s2**3*s3*s5**4*s6 +- 11344*s1*s2**3*s4**3*s5*s6**2 + 5064*s1*s2**3*s4**2*s5**3*s6 - 2050*s1*s2**3*s4*s5**5 +- 346896*s1*s2**3*s5*s6**4 - 54*s1*s2**2*s3**5*s4*s6**2 - 216*s1*s2**2*s3**5*s5**2*s6 ++ 324*s1*s2**2*s3**4*s4**2*s5*s6 - 95*s1*s2**2*s3**4*s4*s5**3 - 80*s1*s2**2*s3**3*s4**4*s6 ++ 43*s1*s2**2*s3**3*s4**3*s5**2 - 12204*s1*s2**2*s3**3*s4*s6**3 - 11475*s1*s2**2*s3**3*s5**2*s6**2 +- 4*s1*s2**2*s3**2*s4**5*s5 - 3888*s1*s2**2*s3**2*s4**2*s5*s6**2 - 4844*s1*s2**2*s3**2*s4*s5**3*s6 +- 725*s1*s2**2*s3**2*s5**5 - 1312*s1*s2**2*s3*s4**4*s6**2 + 1684*s1*s2**2*s3*s4**3*s5**2*s6 ++ 1995*s1*s2**2*s3*s4**2*s5**4 + 139104*s1*s2**2*s3*s4*s6**4 - 32616*s1*s2**2*s3*s5**2*s6**3 ++ 736*s1*s2**2*s4**5*s5*s6 - 676*s1*s2**2*s4**4*s5**3 + 131040*s1*s2**2*s4**2*s5*s6**3 ++ 16240*s1*s2**2*s4*s5**3*s6**2 - 20250*s1*s2**2*s5**5*s6 - 27*s1*s2*s3**6*s4*s5*s6 ++ 18*s1*s2*s3**6*s5**3 + 9*s1*s2*s3**5*s4**3*s6 - 9*s1*s2*s3**5*s4**2*s5**2 + 1944*s1*s2*s3**5*s6**3 ++ s1*s2*s3**4*s4**4*s5 + 6156*s1*s2*s3**4*s4*s5*s6**2 + 1143*s1*s2*s3**4*s5**3*s6 ++ 324*s1*s2*s3**3*s4**3*s6**2 + 1071*s1*s2*s3**3*s4**2*s5**2*s6 + 15*s1*s2*s3**3*s4*s5**4 +- 7776*s1*s2*s3**3*s6**4 - 2028*s1*s2*s3**2*s4**4*s5*s6 - 397*s1*s2*s3**2*s4**3*s5**3 ++ 112860*s1*s2*s3**2*s4*s5*s6**3 - 10305*s1*s2*s3**2*s5**3*s6**2 + 336*s1*s2*s3*s4**6*s6 ++ 304*s1*s2*s3*s4**5*s5**2 - 68976*s1*s2*s3*s4**3*s6**3 - 96732*s1*s2*s3*s4**2*s5**2*s6**2 ++ 36700*s1*s2*s3*s4*s5**4*s6 - 1250*s1*s2*s3*s5**6 - 1477440*s1*s2*s3*s6**5 - 48*s1*s2*s4**7*s5 ++ 4368*s1*s2*s4**4*s5*s6**2 + 10360*s1*s2*s4**3*s5**3*s6 - 3500*s1*s2*s4**2*s5**5 ++ 935280*s1*s2*s4*s5*s6**4 - 242100*s1*s2*s5**3*s6**3 - 972*s1*s3**6*s5*s6**2 - 351*s1*s3**5*s4*s5**2*s6 +- 99*s1*s3**5*s5**4 + 441*s1*s3**4*s4**3*s5*s6 + 141*s1*s3**4*s4**2*s5**3 - 36936*s1*s3**4*s5*s6**3 +- 84*s1*s3**3*s4**5*s6 - 76*s1*s3**3*s4**4*s5**2 + 17496*s1*s3**3*s4**2*s6**3 + 11718*s1*s3**3*s4*s5**2*s6**2 +- 6525*s1*s3**3*s5**4*s6 + 12*s1*s3**2*s4**6*s5 + 11016*s1*s3**2*s4**3*s5*s6**2 + +5895*s1*s3**2*s4**2*s5**3*s6 - 1750*s1*s3**2*s4*s5**5 - 252720*s1*s3**2*s5*s6**4 - +2544*s1*s3*s4**5*s6**2 - 8092*s1*s3*s4**4*s5**2*s6 + 2300*s1*s3*s4**3*s5**4 + 536544*s1*s3*s4**2*s6**4 ++ 169560*s1*s3*s4*s5**2*s6**3 - 103500*s1*s3*s5**4*s6**2 + 1680*s1*s4**6*s5*s6 - 468*s1*s4**5*s5**3 +- 346896*s1*s4**3*s5*s6**3 + 93900*s1*s4**2*s5**3*s6**2 + 35000*s1*s4*s5**5*s6 - 9375*s1*s5**7 ++ 108864*s1*s5*s6**5 + 16*s2**8*s4**2*s6**2 - 8*s2**8*s4*s5**2*s6 + s2**8*s5**4 - +8*s2**7*s3**2*s4*s6**2 + 2*s2**7*s3**2*s5**2*s6 - 96*s2**7*s4*s6**3 - 232*s2**7*s5**2*s6**2 ++ s2**6*s3**4*s6**2 + 24*s2**6*s3**2*s6**3 + 336*s2**6*s3*s4*s5*s6**2 + 108*s2**6*s3*s5**3*s6 +- 32*s2**6*s4**3*s6**2 - 160*s2**6*s4**2*s5**2*s6 + 38*s2**6*s4*s5**4 + 144*s2**6*s6**4 +- 84*s2**5*s3**3*s5*s6**2 + 8*s2**5*s3**2*s4**2*s6**2 - 106*s2**5*s3**2*s4*s5**2*s6 +- 12*s2**5*s3**2*s5**4 + 176*s2**5*s3*s4**3*s5*s6 - 36*s2**5*s3*s4**2*s5**3 - 2544*s2**5*s3*s5*s6**3 +- 32*s2**5*s4**5*s6 + 8*s2**5*s4**4*s5**2 - 3072*s2**5*s4**2*s6**3 + 3032*s2**5*s4*s5**2*s6**2 ++ 954*s2**5*s5**4*s6 + 36*s2**4*s3**4*s5**2*s6 - 80*s2**4*s3**3*s4**2*s5*s6 + 25*s2**4*s3**3*s4*s5**3 ++ 16*s2**4*s3**2*s4**4*s6 - 6*s2**4*s3**2*s4**3*s5**2 + 2520*s2**4*s3**2*s4*s6**3 ++ 222*s2**4*s3**2*s5**2*s6**2 - 1312*s2**4*s3*s4**2*s5*s6**2 - 3616*s2**4*s3*s4*s5**3*s6 +- 125*s2**4*s3*s5**5 + 1296*s2**4*s4**4*s6**2 - 168*s2**4*s4**3*s5**2*s6 + 375*s2**4*s4**2*s5**4 ++ 19296*s2**4*s4*s6**4 + 48408*s2**4*s5**2*s6**3 + 9*s2**3*s3**5*s4*s5*s6 - 4*s2**3*s3**5*s5**3 +- 2*s2**3*s3**4*s4**3*s6 + s2**3*s3**4*s4**2*s5**2 - 432*s2**3*s3**4*s6**3 + 324*s2**3*s3**3*s4*s5*s6**2 ++ 923*s2**3*s3**3*s5**3*s6 - 752*s2**3*s3**2*s4**3*s6**2 + 2262*s2**3*s3**2*s4**2*s5**2*s6 ++ 525*s2**3*s3**2*s4*s5**4 - 9936*s2**3*s3**2*s6**4 - 480*s2**3*s3*s4**4*s5*s6 - 700*s2**3*s3*s4**3*s5**3 +- 68976*s2**3*s3*s4*s5*s6**3 - 11360*s2**3*s3*s5**3*s6**2 - 32*s2**3*s4**6*s6 + 152*s2**3*s4**5*s5**2 ++ 6912*s2**3*s4**3*s6**3 - 7992*s2**3*s4**2*s5**2*s6**2 + 5550*s2**3*s4*s5**4*s6 - +29376*s2**3*s6**5 + 108*s2**2*s3**4*s4**2*s6**2 - 1215*s2**2*s3**4*s4*s5**2*s6 - 150*s2**2*s3**4*s5**4 ++ 336*s2**2*s3**3*s4**3*s5*s6 - 185*s2**2*s3**3*s4**2*s5**3 + 17496*s2**2*s3**3*s5*s6**3 ++ 8*s2**2*s3**2*s4**5*s6 + 370*s2**2*s3**2*s4**4*s5**2 - 864*s2**2*s3**2*s4**2*s6**3 ++ 22572*s2**2*s3**2*s4*s5**2*s6**2 + 225*s2**2*s3**2*s5**4*s6 - 144*s2**2*s3*s4**6*s5 ++ 14784*s2**2*s3*s4**3*s5*s6**2 - 12020*s2**2*s3*s4**2*s5**3*s6 + 625*s2**2*s3*s4*s5**5 ++ 536544*s2**2*s3*s5*s6**4 + 16*s2**2*s4**8 - 3072*s2**2*s4**5*s6**2 + 1096*s2**2*s4**4*s5**2*s6 ++ 250*s2**2*s4**3*s5**4 - 93744*s2**2*s4**2*s6**4 - 249480*s2**2*s4*s5**2*s6**3 + +70125*s2**2*s5**4*s6**2 + 162*s2*s3**6*s5**2*s6 - 54*s2*s3**5*s4**2*s5*s6 + 198*s2*s3**5*s4*s5**3 +- 210*s2*s3**4*s4**3*s5**2 - 3564*s2*s3**4*s5**2*s6**2 + 72*s2*s3**3*s4**5*s5 - 12204*s2*s3**3*s4**2*s5*s6**2 ++ 1935*s2*s3**3*s4*s5**3*s6 - 8*s2*s3**2*s4**7 + 2520*s2*s3**2*s4**4*s6**2 + 1962*s2*s3**2*s4**3*s5**2*s6 +- 125*s2*s3**2*s4**2*s5**4 - 178848*s2*s3**2*s4*s6**4 - 165240*s2*s3**2*s5**2*s6**3 +- 144*s2*s3*s4**5*s5*s6 - 200*s2*s3*s4**4*s5**3 + 139104*s2*s3*s4**2*s5*s6**3 + 72900*s2*s3*s4*s5**3*s6**2 +- 20625*s2*s3*s5**5*s6 - 96*s2*s4**7*s6 + 56*s2*s4**6*s5**2 + 19296*s2*s4**4*s6**3 +- 22080*s2*s4**3*s5**2*s6**2 - 7750*s2*s4**2*s5**4*s6 + 3125*s2*s4*s5**6 + 248832*s2*s4*s6**5 +- 129600*s2*s5**2*s6**4 - 27*s3**7*s5**3 + 27*s3**6*s4**2*s5**2 - 9*s3**5*s4**4*s5 ++ 1944*s3**5*s4*s5*s6**2 + 54*s3**5*s5**3*s6 + s3**4*s4**6 - 432*s3**4*s4**3*s6**2 +- 486*s3**4*s4**2*s5**2*s6 + 46656*s3**4*s6**4 + 36*s3**3*s4**4*s5*s6 + 50*s3**3*s4**3*s5**3 +- 7776*s3**3*s4*s5*s6**3 + 29700*s3**3*s5**3*s6**2 + 24*s3**2*s4**6*s6 - 14*s3**2*s4**5*s5**2 +- 9936*s3**2*s4**3*s6**3 - 29160*s3**2*s4**2*s5**2*s6**2 - 10125*s3**2*s4*s5**4*s6 ++ 3125*s3**2*s5**6 + 1026432*s3**2*s6**5 + 6336*s3*s4**4*s5*s6**2 + 11700*s3*s4**3*s5**3*s6 +- 3125*s3*s4**2*s5**5 - 1477440*s3*s4*s5*s6**4 + 432000*s3*s5**3*s6**3 + 144*s4**6*s6**2 +- 2472*s4**5*s5**2*s6 + 625*s4**4*s5**4 - 29376*s4**3*s6**4 + 529200*s4**2*s5**2*s6**3 +- 292500*s4*s5**4*s6**2 + 40625*s5**6*s6 - 186624*s6**6) + ], + (6, 2): [ + lambda s1, s2, s3, s4, s5, s6: (-s3), + lambda s1, s2, s3, s4, s5, s6: (-s1*s5 + s2*s4 - 9*s6), + lambda s1, s2, s3, s4, s5, s6: (s1*s2*s6 + 2*s1*s3*s5 - s1*s4**2 - s2**2*s5 + 6*s3*s6 + s4*s5), + lambda s1, s2, s3, s4, s5, s6: (s1**2*s4*s6 - s1**2*s5**2 - 3*s1*s2*s3*s6 + s1*s2*s4*s5 + 9*s1*s5*s6 + s2**3*s6 - +9*s2*s4*s6 + s2*s5**2 + 3*s3**2*s6 - 3*s3*s4*s5 + s4**3 + 27*s6**2), + lambda s1, s2, s3, s4, s5, s6: (-2*s1**3*s6**2 + 2*s1**2*s2*s5*s6 + 2*s1**2*s3*s4*s6 - s1**2*s3*s5**2 - s1*s2**2*s4*s6 +- 3*s1*s2*s6**2 - 16*s1*s3*s5*s6 + 4*s1*s4**2*s6 + 2*s1*s4*s5**2 + 4*s2**2*s5*s6 + +s2*s3*s4*s6 + 2*s2*s3*s5**2 - s2*s4**2*s5 - 9*s3*s6**2 - 3*s4*s5*s6 - 2*s5**3), + lambda s1, s2, s3, s4, s5, s6: (s1**3*s3*s6**2 - 3*s1**3*s4*s5*s6 + s1**3*s5**3 - s1**2*s2**2*s6**2 + s1**2*s2*s3*s5*s6 +- 2*s1**2*s4*s6**2 + 6*s1**2*s5**2*s6 + 16*s1*s2*s3*s6**2 - 3*s1*s2*s5**3 - s1*s3**2*s5*s6 +- 2*s1*s3*s4**2*s6 + s1*s3*s4*s5**2 - 30*s1*s5*s6**2 - 4*s2**3*s6**2 - 2*s2**2*s3*s5*s6 ++ s2**2*s4**2*s6 + 18*s2*s4*s6**2 - 2*s2*s5**2*s6 - 15*s3**2*s6**2 + 16*s3*s4*s5*s6 ++ s3*s5**3 - 4*s4**3*s6 - s4**2*s5**2 - 27*s6**3), + lambda s1, s2, s3, s4, s5, s6: (s1**4*s5*s6**2 + 2*s1**3*s2*s4*s6**2 - s1**3*s2*s5**2*s6 - s1**3*s3**2*s6**2 + 9*s1**3*s6**3 +- 14*s1**2*s2*s5*s6**2 - 11*s1**2*s3*s4*s6**2 + 6*s1**2*s3*s5**2*s6 + 3*s1**2*s4**2*s5*s6 +- s1**2*s4*s5**3 + 3*s1*s2**2*s5**2*s6 + 3*s1*s2*s3**2*s6**2 - s1*s2*s3*s4*s5*s6 + +39*s1*s3*s5*s6**2 - 14*s1*s4*s5**2*s6 + s1*s5**4 - 11*s2*s3*s5**2*s6 + 2*s2*s4*s5**3 +- 3*s3**3*s6**2 + 3*s3**2*s4*s5*s6 - s3**2*s5**3 + 9*s5**3*s6), + lambda s1, s2, s3, s4, s5, s6: (-s1**4*s2*s6**3 + s1**4*s3*s5*s6**2 - 4*s1**3*s3*s6**3 + 10*s1**3*s4*s5*s6**2 - 4*s1**3*s5**3*s6 ++ 8*s1**2*s2**2*s6**3 - 8*s1**2*s2*s3*s5*s6**2 - 2*s1**2*s2*s4**2*s6**2 + s1**2*s2*s4*s5**2*s6 ++ s1**2*s3**2*s4*s6**2 - 6*s1**2*s4*s6**3 - 7*s1**2*s5**2*s6**2 - 24*s1*s2*s3*s6**3 +- 4*s1*s2*s4*s5*s6**2 + 10*s1*s2*s5**3*s6 + 8*s1*s3**2*s5*s6**2 + 8*s1*s3*s4**2*s6**2 +- 8*s1*s3*s4*s5**2*s6 + s1*s3*s5**4 + 36*s1*s5*s6**3 + 8*s2**2*s3*s5*s6**2 - 2*s2**2*s4*s5**2*s6 +- 2*s2*s3**2*s4*s6**2 + s2*s3**2*s5**2*s6 - 6*s2*s5**2*s6**2 + 18*s3**2*s6**3 - 24*s3*s4*s5*s6**2 +- 4*s3*s5**3*s6 + 8*s4**2*s5**2*s6 - s4*s5**4), + lambda s1, s2, s3, s4, s5, s6: (-s1**5*s4*s6**3 - 2*s1**4*s5*s6**3 + 3*s1**3*s2*s5**2*s6**2 + 3*s1**3*s3**2*s6**3 +- s1**3*s3*s4*s5*s6**2 - 8*s1**3*s6**4 + 16*s1**2*s2*s5*s6**3 + 8*s1**2*s3*s4*s6**3 +- 6*s1**2*s3*s5**2*s6**2 - 8*s1**2*s4**2*s5*s6**2 + 3*s1**2*s4*s5**3*s6 - 8*s1*s2**2*s5**2*s6**2 +- 8*s1*s2*s3**2*s6**3 + 8*s1*s2*s3*s4*s5*s6**2 - s1*s2*s3*s5**3*s6 - s1*s3**3*s5*s6**2 +- 24*s1*s3*s5*s6**3 + 16*s1*s4*s5**2*s6**2 - 2*s1*s5**4*s6 + 8*s2*s3*s5**2*s6**2 - +s2*s5**5 + 8*s3**3*s6**3 - 8*s3**2*s4*s5*s6**2 + 3*s3**2*s5**3*s6 - 8*s5**3*s6**2), + lambda s1, s2, s3, s4, s5, s6: (s1**6*s6**4 - 4*s1**4*s2*s6**4 - 2*s1**4*s3*s5*s6**3 + s1**4*s4**2*s6**3 + 8*s1**3*s3*s6**4 +- 4*s1**3*s4*s5*s6**3 + 2*s1**3*s5**3*s6**2 + 8*s1**2*s2*s3*s5*s6**3 - 2*s1**2*s2*s4*s5**2*s6**2 +- 2*s1**2*s3**2*s4*s6**3 + s1**2*s3**2*s5**2*s6**2 - 4*s1*s2*s5**3*s6**2 - 12*s1*s3**2*s5*s6**3 ++ 8*s1*s3*s4*s5**2*s6**2 - 2*s1*s3*s5**4*s6 + s2**2*s5**4*s6 - 2*s2*s3**2*s5**2*s6**2 ++ s3**4*s6**3 + 8*s3*s5**3*s6**2 - 4*s4*s5**4*s6 + s5**6) + ], +} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/subfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/subfield.py new file mode 100644 index 0000000000000000000000000000000000000000..c56d0662e4a38b4c0fcaa385c2e0166490354790 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/subfield.py @@ -0,0 +1,516 @@ +r""" +Functions in ``polys.numberfields.subfield`` solve the "Subfield Problem" and +allied problems, for algebraic number fields. + +Following Cohen (see [Cohen93]_ Section 4.5), we can define the main problem as +follows: + +* **Subfield Problem:** + + Given two number fields $\mathbb{Q}(\alpha)$, $\mathbb{Q}(\beta)$ + via the minimal polynomials for their generators $\alpha$ and $\beta$, decide + whether one field is isomorphic to a subfield of the other. + +From a solution to this problem flow solutions to the following problems as +well: + +* **Primitive Element Problem:** + + Given several algebraic numbers + $\alpha_1, \ldots, \alpha_m$, compute a single algebraic number $\theta$ + such that $\mathbb{Q}(\alpha_1, \ldots, \alpha_m) = \mathbb{Q}(\theta)$. + +* **Field Isomorphism Problem:** + + Decide whether two number fields + $\mathbb{Q}(\alpha)$, $\mathbb{Q}(\beta)$ are isomorphic. + +* **Field Membership Problem:** + + Given two algebraic numbers $\alpha$, + $\beta$, decide whether $\alpha \in \mathbb{Q}(\beta)$, and if so write + $\alpha = f(\beta)$ for some $f(x) \in \mathbb{Q}[x]$. +""" + +from sympy.core.add import Add +from sympy.core.numbers import AlgebraicNumber +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify, _sympify +from sympy.ntheory import sieve +from sympy.polys.densetools import dup_eval +from sympy.polys.domains import QQ +from sympy.polys.numberfields.minpoly import _choose_factor, minimal_polynomial +from sympy.polys.polyerrors import IsomorphismFailed +from sympy.polys.polytools import Poly, PurePoly, factor_list +from sympy.utilities import public + +from mpmath import MPContext + + +def is_isomorphism_possible(a, b): + """Necessary but not sufficient test for isomorphism. """ + n = a.minpoly.degree() + m = b.minpoly.degree() + + if m % n != 0: + return False + + if n == m: + return True + + da = a.minpoly.discriminant() + db = b.minpoly.discriminant() + + i, k, half = 1, m//n, db//2 + + while True: + p = sieve[i] + P = p**k + + if P > half: + break + + if ((da % p) % 2) and not (db % P): + return False + + i += 1 + + return True + + +def field_isomorphism_pslq(a, b): + """Construct field isomorphism using PSLQ algorithm. """ + if not a.root.is_real or not b.root.is_real: + raise NotImplementedError("PSLQ doesn't support complex coefficients") + + f = a.minpoly + g = b.minpoly.replace(f.gen) + + n, m, prev = 100, b.minpoly.degree(), None + ctx = MPContext() + + for i in range(1, 5): + A = a.root.evalf(n) + B = b.root.evalf(n) + + basis = [1, B] + [ B**i for i in range(2, m) ] + [-A] + + ctx.dps = n + coeffs = ctx.pslq(basis, maxcoeff=10**10, maxsteps=1000) + + if coeffs is None: + # PSLQ can't find an integer linear combination. Give up. + break + + if coeffs != prev: + prev = coeffs + else: + # Increasing precision didn't produce anything new. Give up. + break + + # We have + # c0 + c1*B + c2*B^2 + ... + cm-1*B^(m-1) - cm*A ~ 0. + # So bring cm*A to the other side, and divide through by cm, + # for an approximate representation of A as a polynomial in B. + # (We know cm != 0 since `b.minpoly` is irreducible.) + coeffs = [S(c)/coeffs[-1] for c in coeffs[:-1]] + + # Throw away leading zeros. + while not coeffs[-1]: + coeffs.pop() + + coeffs = list(reversed(coeffs)) + h = Poly(coeffs, f.gen, domain='QQ') + + # We only have A ~ h(B). We must check whether the relation is exact. + if f.compose(h).rem(g).is_zero: + # Now we know that h(b) is in fact equal to _some conjugate of_ a. + # But from the very precise approximation A ~ h(B) we can assume + # the conjugate is a itself. + return coeffs + else: + n *= 2 + + return None + + +def field_isomorphism_factor(a, b): + """Construct field isomorphism via factorization. """ + _, factors = factor_list(a.minpoly, extension=b) + for f, _ in factors: + if f.degree() == 1: + # Any linear factor f(x) represents some conjugate of a in QQ(b). + # We want to know whether this linear factor represents a itself. + # Let f = x - c + c = -f.rep.TC() + # Write c as polynomial in b + coeffs = c.to_sympy_list() + d, terms = len(coeffs) - 1, [] + for i, coeff in enumerate(coeffs): + terms.append(coeff*b.root**(d - i)) + r = Add(*terms) + # Check whether we got the number a + if a.minpoly.same_root(r, a): + return coeffs + + # If none of the linear factors represented a in QQ(b), then in fact a is + # not an element of QQ(b). + return None + + +@public +def field_isomorphism(a, b, *, fast=True): + r""" + Find an embedding of one number field into another. + + Explanation + =========== + + This function looks for an isomorphism from $\mathbb{Q}(a)$ onto some + subfield of $\mathbb{Q}(b)$. Thus, it solves the Subfield Problem. + + Examples + ======== + + >>> from sympy import sqrt, field_isomorphism, I + >>> print(field_isomorphism(3, sqrt(2))) # doctest: +SKIP + [3] + >>> print(field_isomorphism( I*sqrt(3), I*sqrt(3)/2)) # doctest: +SKIP + [2, 0] + + Parameters + ========== + + a : :py:class:`~.Expr` + Any expression representing an algebraic number. + b : :py:class:`~.Expr` + Any expression representing an algebraic number. + fast : boolean, optional (default=True) + If ``True``, we first attempt a potentially faster way of computing the + isomorphism, falling back on a slower method if this fails. If + ``False``, we go directly to the slower method, which is guaranteed to + return a result. + + Returns + ======= + + List of rational numbers, or None + If $\mathbb{Q}(a)$ is not isomorphic to some subfield of + $\mathbb{Q}(b)$, then return ``None``. Otherwise, return a list of + rational numbers representing an element of $\mathbb{Q}(b)$ to which + $a$ may be mapped, in order to define a monomorphism, i.e. an + isomorphism from $\mathbb{Q}(a)$ to some subfield of $\mathbb{Q}(b)$. + The elements of the list are the coefficients of falling powers of $b$. + + """ + a, b = sympify(a), sympify(b) + + if not a.is_AlgebraicNumber: + a = AlgebraicNumber(a) + + if not b.is_AlgebraicNumber: + b = AlgebraicNumber(b) + + a = a.to_primitive_element() + b = b.to_primitive_element() + + if a == b: + return a.coeffs() + + n = a.minpoly.degree() + m = b.minpoly.degree() + + if n == 1: + return [a.root] + + if m % n != 0: + return None + + if fast: + try: + result = field_isomorphism_pslq(a, b) + + if result is not None: + return result + except NotImplementedError: + pass + + return field_isomorphism_factor(a, b) + + +def _switch_domain(g, K): + # An algebraic relation f(a, b) = 0 over Q can also be written + # g(b) = 0 where g is in Q(a)[x] and h(a) = 0 where h is in Q(b)[x]. + # This function transforms g into h where Q(b) = K. + frep = g.rep.inject() + hrep = frep.eject(K, front=True) + + return g.new(hrep, g.gens[0]) + + +def _linsolve(p): + # Compute root of linear polynomial. + c, d = p.rep.to_list() + return -d/c + + +@public +def primitive_element(extension, x=None, *, ex=False, polys=False): + r""" + Find a single generator for a number field given by several generators. + + Explanation + =========== + + The basic problem is this: Given several algebraic numbers + $\alpha_1, \alpha_2, \ldots, \alpha_n$, find a single algebraic number + $\theta$ such that + $\mathbb{Q}(\alpha_1, \alpha_2, \ldots, \alpha_n) = \mathbb{Q}(\theta)$. + + This function actually guarantees that $\theta$ will be a linear + combination of the $\alpha_i$, with non-negative integer coefficients. + + Furthermore, if desired, this function will tell you how to express each + $\alpha_i$ as a $\mathbb{Q}$-linear combination of the powers of $\theta$. + + Examples + ======== + + >>> from sympy import primitive_element, sqrt, S, minpoly, simplify + >>> from sympy.abc import x + >>> f, lincomb, reps = primitive_element([sqrt(2), sqrt(3)], x, ex=True) + + Then ``lincomb`` tells us the primitive element as a linear combination of + the given generators ``sqrt(2)`` and ``sqrt(3)``. + + >>> print(lincomb) + [1, 1] + + This means the primtiive element is $\sqrt{2} + \sqrt{3}$. + Meanwhile ``f`` is the minimal polynomial for this primitive element. + + >>> print(f) + x**4 - 10*x**2 + 1 + >>> print(minpoly(sqrt(2) + sqrt(3), x)) + x**4 - 10*x**2 + 1 + + Finally, ``reps`` (which was returned only because we set keyword arg + ``ex=True``) tells us how to recover each of the generators $\sqrt{2}$ and + $\sqrt{3}$ as $\mathbb{Q}$-linear combinations of the powers of the + primitive element $\sqrt{2} + \sqrt{3}$. + + >>> print([S(r) for r in reps[0]]) + [1/2, 0, -9/2, 0] + >>> theta = sqrt(2) + sqrt(3) + >>> print(simplify(theta**3/2 - 9*theta/2)) + sqrt(2) + >>> print([S(r) for r in reps[1]]) + [-1/2, 0, 11/2, 0] + >>> print(simplify(-theta**3/2 + 11*theta/2)) + sqrt(3) + + Parameters + ========== + + extension : list of :py:class:`~.Expr` + Each expression must represent an algebraic number $\alpha_i$. + x : :py:class:`~.Symbol`, optional (default=None) + The desired symbol to appear in the computed minimal polynomial for the + primitive element $\theta$. If ``None``, we use a dummy symbol. + ex : boolean, optional (default=False) + If and only if ``True``, compute the representation of each $\alpha_i$ + as a $\mathbb{Q}$-linear combination over the powers of $\theta$. + polys : boolean, optional (default=False) + If ``True``, return the minimal polynomial as a :py:class:`~.Poly`. + Otherwise return it as an :py:class:`~.Expr`. + + Returns + ======= + + Pair (f, coeffs) or triple (f, coeffs, reps), where: + ``f`` is the minimal polynomial for the primitive element. + ``coeffs`` gives the primitive element as a linear combination of the + given generators. + ``reps`` is present if and only if argument ``ex=True`` was passed, + and is a list of lists of rational numbers. Each list gives the + coefficients of falling powers of the primitive element, to recover + one of the original, given generators. + + """ + if not extension: + raise ValueError("Cannot compute primitive element for empty extension") + extension = [_sympify(ext) for ext in extension] + + if x is not None: + x, cls = sympify(x), Poly + else: + x, cls = Dummy('x'), PurePoly + + def _canonicalize(f): + _, f = f.primitive() + if f.LC() < 0: + f = -f + return f + + if not ex: + gen, coeffs = extension[0], [1] + g = minimal_polynomial(gen, x, polys=True) + for ext in extension[1:]: + if ext.is_Rational: + coeffs.append(0) + continue + _, factors = factor_list(g, extension=ext) + g = _choose_factor(factors, x, gen) + [s], _, g = g.sqf_norm() + gen += s*ext + coeffs.append(s) + + g = _canonicalize(g) + if not polys: + return g.as_expr(), coeffs + else: + return cls(g), coeffs + + gen, coeffs = extension[0], [1] + f = minimal_polynomial(gen, x, polys=True) + K = QQ.algebraic_field((f, gen)) # incrementally constructed field + reps = [K.unit] # representations of extension elements in K + for ext in extension[1:]: + if ext.is_Rational: + coeffs.append(0) # rational ext is not included in the expression of a primitive element + reps.append(K.convert(ext)) # but it is included in reps + continue + p = minimal_polynomial(ext, x, polys=True) + L = QQ.algebraic_field((p, ext)) + _, factors = factor_list(f, domain=L) + f = _choose_factor(factors, x, gen) + [s], g, f = f.sqf_norm() + gen += s*ext + coeffs.append(s) + K = QQ.algebraic_field((f, gen)) + h = _switch_domain(g, K) + erep = _linsolve(h.gcd(p)) # ext as element of K + ogen = K.unit - s*erep # old gen as element of K + reps = [dup_eval(_.to_list(), ogen, K) for _ in reps] + [erep] + + if K.ext.root.is_Rational: # all extensions are rational + H = [K.convert(_).rep for _ in extension] + coeffs = [0]*len(extension) + f = cls(x, domain=QQ) + else: + H = [_.to_list() for _ in reps] + + f = _canonicalize(f) + if not polys: + return f.as_expr(), coeffs, H + else: + return f, coeffs, H + + +@public +def to_number_field(extension, theta=None, *, gen=None, alias=None): + r""" + Express one algebraic number in the field generated by another. + + Explanation + =========== + + Given two algebraic numbers $\eta, \theta$, this function either expresses + $\eta$ as an element of $\mathbb{Q}(\theta)$, or else raises an exception + if $\eta \not\in \mathbb{Q}(\theta)$. + + This function is essentially just a convenience, utilizing + :py:func:`~.field_isomorphism` (our solution of the Subfield Problem) to + solve this, the Field Membership Problem. + + As an additional convenience, this function allows you to pass a list of + algebraic numbers $\alpha_1, \alpha_2, \ldots, \alpha_n$ instead of $\eta$. + It then computes $\eta$ for you, as a solution of the Primitive Element + Problem, using :py:func:`~.primitive_element` on the list of $\alpha_i$. + + Examples + ======== + + >>> from sympy import sqrt, to_number_field + >>> eta = sqrt(2) + >>> theta = sqrt(2) + sqrt(3) + >>> a = to_number_field(eta, theta) + >>> print(type(a)) + + >>> a.root + sqrt(2) + sqrt(3) + >>> print(a) + sqrt(2) + >>> a.coeffs() + [1/2, 0, -9/2, 0] + + We get an :py:class:`~.AlgebraicNumber`, whose ``.root`` is $\theta$, whose + value is $\eta$, and whose ``.coeffs()`` show how to write $\eta$ as a + $\mathbb{Q}$-linear combination in falling powers of $\theta$. + + Parameters + ========== + + extension : :py:class:`~.Expr` or list of :py:class:`~.Expr` + Either the algebraic number that is to be expressed in the other field, + or else a list of algebraic numbers, a primitive element for which is + to be expressed in the other field. + theta : :py:class:`~.Expr`, None, optional (default=None) + If an :py:class:`~.Expr` representing an algebraic number, behavior is + as described under **Explanation**. If ``None``, then this function + reduces to a shorthand for calling :py:func:`~.primitive_element` on + ``extension`` and turning the computed primitive element into an + :py:class:`~.AlgebraicNumber`. + gen : :py:class:`~.Symbol`, None, optional (default=None) + If provided, this will be used as the generator symbol for the minimal + polynomial in the returned :py:class:`~.AlgebraicNumber`. + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + If provided, this will be used as the alias symbol for the returned + :py:class:`~.AlgebraicNumber`. + + Returns + ======= + + AlgebraicNumber + Belonging to $\mathbb{Q}(\theta)$ and equaling $\eta$. + + Raises + ====== + + IsomorphismFailed + If $\eta \not\in \mathbb{Q}(\theta)$. + + See Also + ======== + + field_isomorphism + primitive_element + + """ + if hasattr(extension, '__iter__'): + extension = list(extension) + else: + extension = [extension] + + if len(extension) == 1 and isinstance(extension[0], tuple): + return AlgebraicNumber(extension[0], alias=alias) + + minpoly, coeffs = primitive_element(extension, gen, polys=True) + root = sum(coeff*ext for coeff, ext in zip(coeffs, extension)) + + if theta is None: + return AlgebraicNumber((minpoly, root), alias=alias) + else: + theta = sympify(theta) + + if not theta.is_AlgebraicNumber: + theta = AlgebraicNumber(theta, gen=gen, alias=alias) + + coeffs = field_isomorphism(root, theta) + + if coeffs is not None: + return AlgebraicNumber(theta, coeffs, alias=alias) + else: + raise IsomorphismFailed( + "%s is not in a subfield of %s" % (root, theta.root)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_basis.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_basis.py new file mode 100644 index 0000000000000000000000000000000000000000..c0ed017936cc5c24da63ac02ceca0480f1945feb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_basis.py @@ -0,0 +1,85 @@ +from sympy.abc import x +from sympy.core import S +from sympy.core.numbers import AlgebraicNumber +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys import Poly, cyclotomic_poly +from sympy.polys.domains import QQ +from sympy.polys.matrices import DomainMatrix, DM +from sympy.polys.numberfields.basis import round_two +from sympy.testing.pytest import raises + + +def test_round_two(): + # Poly must be irreducible, and over ZZ or QQ: + raises(ValueError, lambda: round_two(Poly(x ** 2 - 1))) + raises(ValueError, lambda: round_two(Poly(x ** 2 + sqrt(2)))) + + # Test on many fields: + cases = ( + # A couple of cyclotomic fields: + (cyclotomic_poly(5), DomainMatrix.eye(4, QQ), 125), + (cyclotomic_poly(7), DomainMatrix.eye(6, QQ), -16807), + # A couple of quadratic fields (one 1 mod 4, one 3 mod 4): + (x ** 2 - 5, DM([[1, (1, 2)], [0, (1, 2)]], QQ), 5), + (x ** 2 - 7, DM([[1, 0], [0, 1]], QQ), 28), + # Dedekind's example of a field with 2 as essential disc divisor: + (x ** 3 + x ** 2 - 2 * x + 8, DM([[1, 0, 0], [0, 1, 0], [0, (1, 2), (1, 2)]], QQ).transpose(), -503), + # A bunch of cubics with various forms for F -- all of these require + # second or third enlargements. (Five of them require a third, while the rest require just a second.) + # F = 2^2 + (x**3 + 3 * x**2 - 4 * x + 4, DM([((1, 2), (1, 4), (1, 4)), (0, (1, 2), (1, 2)), (0, 0, 1)], QQ).transpose(), -83), + # F = 2^2 * 3 + (x**3 + 3 * x**2 + 3 * x - 3, DM([((1, 2), 0, (1, 2)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -108), + # F = 2^3 + (x**3 + 5 * x**2 - x + 3, DM([((1, 4), 0, (3, 4)), (0, (1, 2), (1, 2)), (0, 0, 1)], QQ).transpose(), -31), + # F = 2^2 * 5 + (x**3 + 5 * x**2 - 5 * x - 5, DM([((1, 2), 0, (1, 2)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), 1300), + # F = 3^2 + (x**3 + 3 * x**2 + 5, DM([((1, 3), (1, 3), (1, 3)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -135), + # F = 3^3 + (x**3 + 6 * x**2 + 3 * x - 1, DM([((1, 3), (1, 3), (1, 3)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), 81), + # F = 2^2 * 3^2 + (x**3 + 6 * x**2 + 4, DM([((1, 3), (2, 3), (1, 3)), (0, 1, 0), (0, 0, (1, 2))], QQ).transpose(), -108), + # F = 2^3 * 7 + (x**3 + 7 * x**2 + 7 * x - 7, DM([((1, 4), 0, (3, 4)), (0, (1, 2), (1, 2)), (0, 0, 1)], QQ).transpose(), 49), + # F = 2^2 * 13 + (x**3 + 7 * x**2 - x + 5, DM([((1, 2), 0, (1, 2)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -2028), + # F = 2^4 + (x**3 + 7 * x**2 - 5 * x + 5, DM([((1, 4), 0, (3, 4)), (0, (1, 2), (1, 2)), (0, 0, 1)], QQ).transpose(), -140), + # F = 5^2 + (x**3 + 4 * x**2 - 3 * x + 7, DM([((1, 5), (4, 5), (4, 5)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -175), + # F = 7^2 + (x**3 + 8 * x**2 + 5 * x - 1, DM([((1, 7), (6, 7), (2, 7)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), 49), + # F = 2 * 5 * 7 + (x**3 + 8 * x**2 - 2 * x + 6, DM([(1, 0, 0), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -14700), + # F = 2^2 * 3 * 5 + (x**3 + 6 * x**2 - 3 * x + 8, DM([(1, 0, 0), (0, (1, 4), (1, 4)), (0, 0, 1)], QQ).transpose(), -675), + # F = 2 * 3^2 * 7 + (x**3 + 9 * x**2 + 6 * x - 8, DM([(1, 0, 0), (0, (1, 2), (1, 2)), (0, 0, 1)], QQ).transpose(), 3969), + # F = 2^2 * 3^2 * 7 + (x**3 + 15 * x**2 - 9 * x + 13, DM([((1, 6), (1, 3), (1, 6)), (0, 1, 0), (0, 0, 1)], QQ).transpose(), -5292), + # Polynomial need not be monic + (5*x**3 + 5*x**2 - 10 * x + 40, DM([[1, 0, 0], [0, 1, 0], [0, (1, 2), (1, 2)]], QQ).transpose(), -503), + # Polynomial can have non-integer rational coeffs + (QQ(5, 3)*x**3 + QQ(5, 3)*x**2 - QQ(10, 3)*x + QQ(40, 3), DM([[1, 0, 0], [0, 1, 0], [0, (1, 2), (1, 2)]], QQ).transpose(), -503), + ) + for f, B_exp, d_exp in cases: + K = QQ.alg_field_from_poly(f) + B = K.maximal_order().QQ_matrix + d = K.discriminant() + assert d == d_exp + # The computed basis need not equal the expected one, but their quotient + # must be unimodular: + assert (B.inv()*B_exp).det()**2 == 1 + + +def test_AlgebraicField_integral_basis(): + alpha = AlgebraicNumber(sqrt(5), alias='alpha') + k = QQ.algebraic_field(alpha) + B0 = k.integral_basis() + B1 = k.integral_basis(fmt='sympy') + B2 = k.integral_basis(fmt='alg') + assert B0 == [k([1]), k([S.Half, S.Half])] + assert B1 == [1, S.Half + alpha/2] + assert B2 == [k.ext.field_element([1]), + k.ext.field_element([S.Half, S.Half])] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_galoisgroups.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_galoisgroups.py new file mode 100644 index 0000000000000000000000000000000000000000..e4cb3d51bcdfad7764b3f6f62dbd2049e466e9e1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_galoisgroups.py @@ -0,0 +1,143 @@ +"""Tests for computing Galois groups. """ + +from sympy.abc import x +from sympy.combinatorics.galois import ( + S1TransitiveSubgroups, S2TransitiveSubgroups, S3TransitiveSubgroups, + S4TransitiveSubgroups, S5TransitiveSubgroups, S6TransitiveSubgroups, +) +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.numberfields.galoisgroups import ( + tschirnhausen_transformation, + galois_group, + _galois_group_degree_4_root_approx, + _galois_group_degree_5_hybrid, +) +from sympy.polys.numberfields.subfield import field_isomorphism +from sympy.polys.polytools import Poly +from sympy.testing.pytest import raises + + +def test_tschirnhausen_transformation(): + for T in [ + Poly(x**2 - 2), + Poly(x**2 + x + 1), + Poly(x**4 + 1), + Poly(x**4 - x**3 + x**2 - x + 1), + ]: + _, U = tschirnhausen_transformation(T) + assert U.degree() == T.degree() + assert U.is_monic + assert U.is_irreducible + K = QQ.alg_field_from_poly(T) + L = QQ.alg_field_from_poly(U) + assert field_isomorphism(K.ext, L.ext) is not None + + +# Test polys are from: +# Cohen, H. *A Course in Computational Algebraic Number Theory*. +test_polys_by_deg = { + # Degree 1 + 1: [ + (x, S1TransitiveSubgroups.S1, True) + ], + # Degree 2 + 2: [ + (x**2 + x + 1, S2TransitiveSubgroups.S2, False) + ], + # Degree 3 + 3: [ + (x**3 + x**2 - 2*x - 1, S3TransitiveSubgroups.A3, True), + (x**3 + 2, S3TransitiveSubgroups.S3, False), + ], + # Degree 4 + 4: [ + (x**4 + x**3 + x**2 + x + 1, S4TransitiveSubgroups.C4, False), + (x**4 + 1, S4TransitiveSubgroups.V, True), + (x**4 - 2, S4TransitiveSubgroups.D4, False), + (x**4 + 8*x + 12, S4TransitiveSubgroups.A4, True), + (x**4 + x + 1, S4TransitiveSubgroups.S4, False), + ], + # Degree 5 + 5: [ + (x**5 + x**4 - 4*x**3 - 3*x**2 + 3*x + 1, S5TransitiveSubgroups.C5, True), + (x**5 - 5*x + 12, S5TransitiveSubgroups.D5, True), + (x**5 + 2, S5TransitiveSubgroups.M20, False), + (x**5 + 20*x + 16, S5TransitiveSubgroups.A5, True), + (x**5 - x + 1, S5TransitiveSubgroups.S5, False), + ], + # Degree 6 + 6: [ + (x**6 + x**5 + x**4 + x**3 + x**2 + x + 1, S6TransitiveSubgroups.C6, False), + (x**6 + 108, S6TransitiveSubgroups.S3, False), + (x**6 + 2, S6TransitiveSubgroups.D6, False), + (x**6 - 3*x**2 - 1, S6TransitiveSubgroups.A4, True), + (x**6 + 3*x**3 + 3, S6TransitiveSubgroups.G18, False), + (x**6 - 3*x**2 + 1, S6TransitiveSubgroups.A4xC2, False), + (x**6 - 4*x**2 - 1, S6TransitiveSubgroups.S4p, True), + (x**6 - 3*x**5 + 6*x**4 - 7*x**3 + 2*x**2 + x - 4, S6TransitiveSubgroups.S4m, False), + (x**6 + 2*x**3 - 2, S6TransitiveSubgroups.G36m, False), + (x**6 + 2*x**2 + 2, S6TransitiveSubgroups.S4xC2, False), + (x**6 + 10*x**5 + 55*x**4 + 140*x**3 + 175*x**2 + 170*x + 25, S6TransitiveSubgroups.PSL2F5, True), + (x**6 + 10*x**5 + 55*x**4 + 140*x**3 + 175*x**2 - 3019*x + 25, S6TransitiveSubgroups.PGL2F5, False), + (x**6 + 6*x**4 + 2*x**3 + 9*x**2 + 6*x - 4, S6TransitiveSubgroups.G36p, True), + (x**6 + 2*x**4 + 2*x**3 + x**2 + 2*x + 2, S6TransitiveSubgroups.G72, False), + (x**6 + 24*x - 20, S6TransitiveSubgroups.A6, True), + (x**6 + x + 1, S6TransitiveSubgroups.S6, False), + ], +} + + +def test_galois_group(): + """ + Try all the test polys. + """ + for deg in range(1, 7): + polys = test_polys_by_deg[deg] + for T, G, alt in polys: + assert galois_group(T, by_name=True) == (G, alt) + + +def test_galois_group_degree_out_of_bounds(): + raises(ValueError, lambda: galois_group(Poly(0, x))) + raises(ValueError, lambda: galois_group(Poly(1, x))) + raises(ValueError, lambda: galois_group(Poly(x ** 7 + 1))) + + +def test_galois_group_not_by_name(): + """ + Check at least one polynomial of each supported degree, to see that + conversion from name to group works. + """ + for deg in range(1, 7): + T, G_name, _ = test_polys_by_deg[deg][0] + G, _ = galois_group(T) + assert G == G_name.get_perm_group() + + +def test_galois_group_not_monic_over_ZZ(): + """ + Check that we can work with polys that are not monic over ZZ. + """ + for deg in range(1, 7): + T, G, alt = test_polys_by_deg[deg][0] + assert galois_group(T/2, by_name=True) == (G, alt) + + +def test__galois_group_degree_4_root_approx(): + for T, G, alt in test_polys_by_deg[4]: + assert _galois_group_degree_4_root_approx(Poly(T)) == (G, alt) + + +def test__galois_group_degree_5_hybrid(): + for T, G, alt in test_polys_by_deg[5]: + assert _galois_group_degree_5_hybrid(Poly(T)) == (G, alt) + + +def test_AlgebraicField_galois_group(): + k = QQ.alg_field_from_poly(Poly(x**4 + 1)) + G, _ = k.galois_group(by_name=True) + assert G == S4TransitiveSubgroups.V + + k = QQ.alg_field_from_poly(Poly(x**4 - 2)) + G, _ = k.galois_group(by_name=True) + assert G == S4TransitiveSubgroups.D4 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_minpoly.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_minpoly.py new file mode 100644 index 0000000000000000000000000000000000000000..792e5ad6e136bb00abda0b0739b2fff4fd41937b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_minpoly.py @@ -0,0 +1,490 @@ +"""Tests for minimal polynomials. """ + +from sympy.core.function import expand +from sympy.core import (GoldenRatio, TribonacciConstant) +from sympy.core.numbers import (AlgebraicNumber, I, Rational, oo, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import (cbrt, sqrt) +from sympy.functions.elementary.trigonometric import (cos, sin, tan) +from sympy.ntheory.generate import nextprime +from sympy.polys.polytools import Poly +from sympy.polys.rootoftools import CRootOf +from sympy.solvers.solveset import nonlinsolve +from sympy.geometry import Circle, intersection +from sympy.testing.pytest import raises, slow +from sympy.sets.sets import FiniteSet +from sympy.geometry.point import Point2D +from sympy.polys.numberfields.minpoly import ( + minimal_polynomial, + _choose_factor, + _minpoly_op_algebraic_element, + _separate_sq, + _minpoly_groebner, +) +from sympy.polys.partfrac import apart +from sympy.polys.polyerrors import ( + NotAlgebraic, + GeneratorsError, +) + +from sympy.polys.domains import QQ +from sympy.polys.rootoftools import rootof +from sympy.polys.polytools import degree + +from sympy.abc import x, y, z + +Q = Rational + + +def test_minimal_polynomial(): + assert minimal_polynomial(-7, x) == x + 7 + assert minimal_polynomial(-1, x) == x + 1 + assert minimal_polynomial( 0, x) == x + assert minimal_polynomial( 1, x) == x - 1 + assert minimal_polynomial( 7, x) == x - 7 + + assert minimal_polynomial(sqrt(2), x) == x**2 - 2 + assert minimal_polynomial(sqrt(5), x) == x**2 - 5 + assert minimal_polynomial(sqrt(6), x) == x**2 - 6 + + assert minimal_polynomial(2*sqrt(2), x) == x**2 - 8 + assert minimal_polynomial(3*sqrt(5), x) == x**2 - 45 + assert minimal_polynomial(4*sqrt(6), x) == x**2 - 96 + + assert minimal_polynomial(2*sqrt(2) + 3, x) == x**2 - 6*x + 1 + assert minimal_polynomial(3*sqrt(5) + 6, x) == x**2 - 12*x - 9 + assert minimal_polynomial(4*sqrt(6) + 7, x) == x**2 - 14*x - 47 + + assert minimal_polynomial(2*sqrt(2) - 3, x) == x**2 + 6*x + 1 + assert minimal_polynomial(3*sqrt(5) - 6, x) == x**2 + 12*x - 9 + assert minimal_polynomial(4*sqrt(6) - 7, x) == x**2 + 14*x - 47 + + assert minimal_polynomial(sqrt(1 + sqrt(6)), x) == x**4 - 2*x**2 - 5 + assert minimal_polynomial(sqrt(I + sqrt(6)), x) == x**8 - 10*x**4 + 49 + + assert minimal_polynomial(2*I + sqrt(2 + I), x) == x**4 + 4*x**2 + 8*x + 37 + + assert minimal_polynomial(sqrt(2) + sqrt(3), x) == x**4 - 10*x**2 + 1 + assert minimal_polynomial( + sqrt(2) + sqrt(3) + sqrt(6), x) == x**4 - 22*x**2 - 48*x - 23 + + a = 1 - 9*sqrt(2) + 7*sqrt(3) + + assert minimal_polynomial( + 1/a, x) == 392*x**4 - 1232*x**3 + 612*x**2 + 4*x - 1 + assert minimal_polynomial( + 1/sqrt(a), x) == 392*x**8 - 1232*x**6 + 612*x**4 + 4*x**2 - 1 + + raises(NotAlgebraic, lambda: minimal_polynomial(oo, x)) + raises(NotAlgebraic, lambda: minimal_polynomial(2**y, x)) + raises(NotAlgebraic, lambda: minimal_polynomial(sin(1), x)) + + assert minimal_polynomial(sqrt(2)).dummy_eq(x**2 - 2) + assert minimal_polynomial(sqrt(2), x) == x**2 - 2 + + assert minimal_polynomial(sqrt(2), polys=True) == Poly(x**2 - 2) + assert minimal_polynomial(sqrt(2), x, polys=True) == Poly(x**2 - 2, domain='QQ') + assert minimal_polynomial(sqrt(2), x, polys=True, compose=False) == Poly(x**2 - 2, domain='QQ') + + a = AlgebraicNumber(sqrt(2)) + b = AlgebraicNumber(sqrt(3)) + + assert minimal_polynomial(a, x) == x**2 - 2 + assert minimal_polynomial(b, x) == x**2 - 3 + + assert minimal_polynomial(a, x, polys=True) == Poly(x**2 - 2, domain='QQ') + assert minimal_polynomial(b, x, polys=True) == Poly(x**2 - 3, domain='QQ') + + assert minimal_polynomial(sqrt(a/2 + 17), x) == 2*x**4 - 68*x**2 + 577 + assert minimal_polynomial(sqrt(b/2 + 17), x) == 4*x**4 - 136*x**2 + 1153 + + a, b = sqrt(2)/3 + 7, AlgebraicNumber(sqrt(2)/3 + 7) + + f = 81*x**8 - 2268*x**6 - 4536*x**5 + 22644*x**4 + 63216*x**3 - \ + 31608*x**2 - 189648*x + 141358 + + assert minimal_polynomial(sqrt(a) + sqrt(sqrt(a)), x) == f + assert minimal_polynomial(sqrt(b) + sqrt(sqrt(b)), x) == f + + assert minimal_polynomial( + a**Q(3, 2), x) == 729*x**4 - 506898*x**2 + 84604519 + + # issue 5994 + eq = S(''' + -1/(800*sqrt(-1/240 + 1/(18000*(-1/17280000 + + sqrt(15)*I/28800000)**(1/3)) + 2*(-1/17280000 + + sqrt(15)*I/28800000)**(1/3)))''') + assert minimal_polynomial(eq, x) == 8000*x**2 - 1 + + ex = (sqrt(5)*sqrt(I)/(5*sqrt(1 + 125*I)) + + 25*sqrt(5)/(I**Q(5,2)*(1 + 125*I)**Q(3,2)) + + 3125*sqrt(5)/(I**Q(11,2)*(1 + 125*I)**Q(3,2)) + + 5*I*sqrt(1 - I/125)) + mp = minimal_polynomial(ex, x) + assert mp == 25*x**4 + 5000*x**2 + 250016 + + ex = 1 + sqrt(2) + sqrt(3) + mp = minimal_polynomial(ex, x) + assert mp == x**4 - 4*x**3 - 4*x**2 + 16*x - 8 + + ex = 1/(1 + sqrt(2) + sqrt(3)) + mp = minimal_polynomial(ex, x) + assert mp == 8*x**4 - 16*x**3 + 4*x**2 + 4*x - 1 + + p = (expand((1 + sqrt(2) - 2*sqrt(3) + sqrt(7))**3))**Rational(1, 3) + mp = minimal_polynomial(p, x) + assert mp == x**8 - 8*x**7 - 56*x**6 + 448*x**5 + 480*x**4 - 5056*x**3 + 1984*x**2 + 7424*x - 3008 + p = expand((1 + sqrt(2) - 2*sqrt(3) + sqrt(7))**3) + mp = minimal_polynomial(p, x) + assert mp == x**8 - 512*x**7 - 118208*x**6 + 31131136*x**5 + 647362560*x**4 - 56026611712*x**3 + 116994310144*x**2 + 404854931456*x - 27216576512 + + assert minimal_polynomial(S("-sqrt(5)/2 - 1/2 + (-sqrt(5)/2 - 1/2)**2"), x) == x - 1 + a = 1 + sqrt(2) + assert minimal_polynomial((a*sqrt(2) + a)**3, x) == x**2 - 198*x + 1 + + p = 1/(1 + sqrt(2) + sqrt(3)) + assert minimal_polynomial(p, x, compose=False) == 8*x**4 - 16*x**3 + 4*x**2 + 4*x - 1 + + p = 2/(1 + sqrt(2) + sqrt(3)) + assert minimal_polynomial(p, x, compose=False) == x**4 - 4*x**3 + 2*x**2 + 4*x - 2 + + assert minimal_polynomial(1 + sqrt(2)*I, x, compose=False) == x**2 - 2*x + 3 + assert minimal_polynomial(1/(1 + sqrt(2)) + 1, x, compose=False) == x**2 - 2 + assert minimal_polynomial(sqrt(2)*I + I*(1 + sqrt(2)), x, + compose=False) == x**4 + 18*x**2 + 49 + + # minimal polynomial of I + assert minimal_polynomial(I, x, domain=QQ.algebraic_field(I)) == x - I + K = QQ.algebraic_field(I*(sqrt(2) + 1)) + assert minimal_polynomial(I, x, domain=K) == x - I + assert minimal_polynomial(I, x, domain=QQ) == x**2 + 1 + assert minimal_polynomial(I, x, domain='QQ(y)') == x**2 + 1 + + #issue 11553 + assert minimal_polynomial(GoldenRatio, x) == x**2 - x - 1 + assert minimal_polynomial(TribonacciConstant + 3, x) == x**3 - 10*x**2 + 32*x - 34 + assert minimal_polynomial(GoldenRatio, x, domain=QQ.algebraic_field(sqrt(5))) == \ + 2*x - sqrt(5) - 1 + assert minimal_polynomial(TribonacciConstant, x, domain=QQ.algebraic_field(cbrt(19 - 3*sqrt(33)))) == \ + 48*x - 19*(19 - 3*sqrt(33))**Rational(2, 3) - 3*sqrt(33)*(19 - 3*sqrt(33))**Rational(2, 3) \ + - 16*(19 - 3*sqrt(33))**Rational(1, 3) - 16 + + # AlgebraicNumber with an alias. + # Wester H24 + phi = AlgebraicNumber(S.GoldenRatio.expand(func=True), alias='phi') + assert minimal_polynomial(phi, x) == x**2 - x - 1 + + +def test_issue_26903(): + p1 = nextprime(10**16) # greater than 10**15 + p2 = nextprime(p1) + assert sqrt(p1**2*p2).is_Pow # square not extracted + zero = sqrt(p1**2*p2) - p1*sqrt(p2) + assert minimal_polynomial(zero, x) == x + assert minimal_polynomial(sqrt(2) - zero, x) == x**2 - 2 + + +def test_issue_8353(): + assert minimal_polynomial(exp(3*I*pi, evaluate=False), x) == x + 1 + assert minimal_polynomial(Pow(8, S(1)/3, evaluate=False), x + ) == x - 2 + + +def test_minimal_polynomial_issue_19732(): + # https://github.com/sympy/sympy/issues/19732 + expr = (-280898097948878450887044002323982963174671632174995451265117559518123750720061943079105185551006003416773064305074191140286225850817291393988597615/(-488144716373031204149459129212782509078221364279079444636386844223983756114492222145074506571622290776245390771587888364089507840000000*sqrt(238368341569)*sqrt(S(11918417078450)/63568729 + - 24411360*sqrt(238368341569)/63568729) + + 238326799225996604451373809274348704114327860564921529846705817404208077866956345381951726531296652901169111729944612727047670549086208000000*sqrt(S(11918417078450)/63568729 + - 24411360*sqrt(238368341569)/63568729)) - + 180561807339168676696180573852937120123827201075968945871075967679148461189459480842956689723484024031016208588658753107/(-59358007109636562851035004992802812513575019937126272896569856090962677491318275291141463850327474176000000*sqrt(238368341569)*sqrt(S(11918417078450)/63568729 + - 24411360*sqrt(238368341569)/63568729) + + 28980348180319251787320809875930301310576055074938369007463004788921613896002936637780993064387310446267596800000*sqrt(S(11918417078450)/63568729 + - 24411360*sqrt(238368341569)/63568729))) + poly = (2151288870990266634727173620565483054187142169311153766675688628985237817262915166497766867289157986631135400926544697981091151416655364879773546003475813114962656742744975460025956167152918469472166170500512008351638710934022160294849059721218824490226159355197136265032810944357335461128949781377875451881300105989490353140886315677977149440000000000000000000000*x**4 + - 5773274155644072033773937864114266313663195672820501581692669271302387257492905909558846459600429795784309388968498783843631580008547382703258503404023153694528041873101120067477617592651525155101107144042679962433039557235772239171616433004024998230222455940044709064078962397144550855715640331680262171410099614469231080995436488414164502751395405398078353242072696360734131090111239998110773292915337556205692674790561090109440000000000000*x**2 + + 211295968822207088328287206509522887719741955693091053353263782924470627623790749534705683380138972642560898936171035770539616881000369889020398551821767092685775598633794696371561234818461806577723412581353857653829324364446419444210520602157621008010129702779407422072249192199762604318993590841636967747488049176548615614290254356975376588506729604345612047361483789518445332415765213187893207704958013682516462853001964919444736320672860140355089) + assert minimal_polynomial(expr, x) == poly + + +def test_minimal_polynomial_hi_prec(): + p = 1/sqrt(1 - 9*sqrt(2) + 7*sqrt(3) + Rational(1, 10)**30) + mp = minimal_polynomial(p, x) + # checked with Wolfram Alpha + assert mp.coeff(x**6) == -1232000000000000000000000000001223999999999999999999999999999987999999999999999999999999999996000000000000000000000000000000 + + +def test_minimal_polynomial_sq(): + from sympy.core.add import Add + from sympy.core.function import expand_multinomial + p = expand_multinomial((1 + 5*sqrt(2) + 2*sqrt(3))**3) + mp = minimal_polynomial(p**Rational(1, 3), x) + assert mp == x**4 - 4*x**3 - 118*x**2 + 244*x + 1321 + p = expand_multinomial((1 + sqrt(2) - 2*sqrt(3) + sqrt(7))**3) + mp = minimal_polynomial(p**Rational(1, 3), x) + assert mp == x**8 - 8*x**7 - 56*x**6 + 448*x**5 + 480*x**4 - 5056*x**3 + 1984*x**2 + 7424*x - 3008 + p = Add(*[sqrt(i) for i in range(1, 12)]) + mp = minimal_polynomial(p, x) + assert mp.subs({x: 0}) == -71965773323122507776 + + +def test_minpoly_compose(): + # issue 6868 + eq = S(''' + -1/(800*sqrt(-1/240 + 1/(18000*(-1/17280000 + + sqrt(15)*I/28800000)**(1/3)) + 2*(-1/17280000 + + sqrt(15)*I/28800000)**(1/3)))''') + mp = minimal_polynomial(eq + 3, x) + assert mp == 8000*x**2 - 48000*x + 71999 + + # issue 5888 + assert minimal_polynomial(exp(I*pi/8), x) == x**8 + 1 + + mp = minimal_polynomial(sin(pi/7) + sqrt(2), x) + assert mp == 4096*x**12 - 63488*x**10 + 351488*x**8 - 826496*x**6 + \ + 770912*x**4 - 268432*x**2 + 28561 + mp = minimal_polynomial(cos(pi/7) + sqrt(2), x) + assert mp == 64*x**6 - 64*x**5 - 432*x**4 + 304*x**3 + 712*x**2 - \ + 232*x - 239 + mp = minimal_polynomial(exp(I*pi/7) + sqrt(2), x) + assert mp == x**12 - 2*x**11 - 9*x**10 + 16*x**9 + 43*x**8 - 70*x**7 - 97*x**6 + 126*x**5 + 211*x**4 - 212*x**3 - 37*x**2 + 142*x + 127 + + mp = minimal_polynomial(sin(pi/7) + sqrt(2), x) + assert mp == 4096*x**12 - 63488*x**10 + 351488*x**8 - 826496*x**6 + \ + 770912*x**4 - 268432*x**2 + 28561 + mp = minimal_polynomial(cos(pi/7) + sqrt(2), x) + assert mp == 64*x**6 - 64*x**5 - 432*x**4 + 304*x**3 + 712*x**2 - \ + 232*x - 239 + mp = minimal_polynomial(exp(I*pi/7) + sqrt(2), x) + assert mp == x**12 - 2*x**11 - 9*x**10 + 16*x**9 + 43*x**8 - 70*x**7 - 97*x**6 + 126*x**5 + 211*x**4 - 212*x**3 - 37*x**2 + 142*x + 127 + + mp = minimal_polynomial(exp(I*pi*Rational(2, 7)), x) + assert mp == x**6 + x**5 + x**4 + x**3 + x**2 + x + 1 + mp = minimal_polynomial(exp(I*pi*Rational(2, 15)), x) + assert mp == x**8 - x**7 + x**5 - x**4 + x**3 - x + 1 + mp = minimal_polynomial(cos(pi*Rational(2, 7)), x) + assert mp == 8*x**3 + 4*x**2 - 4*x - 1 + mp = minimal_polynomial(sin(pi*Rational(2, 7)), x) + ex = (5*cos(pi*Rational(2, 7)) - 7)/(9*cos(pi/7) - 5*cos(pi*Rational(3, 7))) + mp = minimal_polynomial(ex, x) + assert mp == x**3 + 2*x**2 - x - 1 + assert minimal_polynomial(-1/(2*cos(pi/7)), x) == x**3 + 2*x**2 - x - 1 + assert minimal_polynomial(sin(pi*Rational(2, 15)), x) == \ + 256*x**8 - 448*x**6 + 224*x**4 - 32*x**2 + 1 + assert minimal_polynomial(sin(pi*Rational(5, 14)), x) == 8*x**3 - 4*x**2 - 4*x + 1 + assert minimal_polynomial(cos(pi/15), x) == 16*x**4 + 8*x**3 - 16*x**2 - 8*x + 1 + + ex = rootof(x**3 +x*4 + 1, 0) + mp = minimal_polynomial(ex, x) + assert mp == x**3 + 4*x + 1 + mp = minimal_polynomial(ex + 1, x) + assert mp == x**3 - 3*x**2 + 7*x - 4 + assert minimal_polynomial(exp(I*pi/3), x) == x**2 - x + 1 + assert minimal_polynomial(exp(I*pi/4), x) == x**4 + 1 + assert minimal_polynomial(exp(I*pi/6), x) == x**4 - x**2 + 1 + assert minimal_polynomial(exp(I*pi/9), x) == x**6 - x**3 + 1 + assert minimal_polynomial(exp(I*pi/10), x) == x**8 - x**6 + x**4 - x**2 + 1 + assert minimal_polynomial(sin(pi/9), x) == 64*x**6 - 96*x**4 + 36*x**2 - 3 + assert minimal_polynomial(sin(pi/11), x) == 1024*x**10 - 2816*x**8 + \ + 2816*x**6 - 1232*x**4 + 220*x**2 - 11 + assert minimal_polynomial(sin(pi/21), x) == 4096*x**12 - 11264*x**10 + \ + 11264*x**8 - 4992*x**6 + 960*x**4 - 64*x**2 + 1 + assert minimal_polynomial(cos(pi/9), x) == 8*x**3 - 6*x - 1 + + ex = 2**Rational(1, 3)*exp(2*I*pi/3) + assert minimal_polynomial(ex, x) == x**3 - 2 + + raises(NotAlgebraic, lambda: minimal_polynomial(cos(pi*sqrt(2)), x)) + raises(NotAlgebraic, lambda: minimal_polynomial(sin(pi*sqrt(2)), x)) + raises(NotAlgebraic, lambda: minimal_polynomial(exp(1.618*I*pi), x)) + raises(NotAlgebraic, lambda: minimal_polynomial(exp(I*pi*sqrt(2)), x)) + + # issue 5934 + ex = 1/(-36000 - 7200*sqrt(5) + (12*sqrt(10)*sqrt(sqrt(5) + 5) + + 24*sqrt(10)*sqrt(-sqrt(5) + 5))**2) + 1 + raises(ZeroDivisionError, lambda: minimal_polynomial(ex, x)) + + ex = sqrt(1 + 2**Rational(1,3)) + sqrt(1 + 2**Rational(1,4)) + sqrt(2) + mp = minimal_polynomial(ex, x) + assert degree(mp) == 48 and mp.subs({x:0}) == -16630256576 + + ex = tan(pi/5, evaluate=False) + mp = minimal_polynomial(ex, x) + assert mp == x**4 - 10*x**2 + 5 + assert mp.subs(x, tan(pi/5)).is_zero + + ex = tan(pi/6, evaluate=False) + mp = minimal_polynomial(ex, x) + assert mp == 3*x**2 - 1 + assert mp.subs(x, tan(pi/6)).is_zero + + ex = tan(pi/10, evaluate=False) + mp = minimal_polynomial(ex, x) + assert mp == 5*x**4 - 10*x**2 + 1 + assert mp.subs(x, tan(pi/10)).is_zero + + raises(NotAlgebraic, lambda: minimal_polynomial(tan(pi*sqrt(2)), x)) + + +def test_minpoly_issue_7113(): + # see discussion in https://github.com/sympy/sympy/pull/2234 + from sympy.simplify.simplify import nsimplify + r = nsimplify(pi, tolerance=0.000000001) + mp = minimal_polynomial(r, x) + assert mp == 1768292677839237920489538677417507171630859375*x**109 - \ + 2734577732179183863586489182929671773182898498218854181690460140337930774573792597743853652058046464 + + +def test_minpoly_issue_23677(): + r1 = CRootOf(4000000*x**3 - 239960000*x**2 + 4782399900*x - 31663998001, 0) + r2 = CRootOf(4000000*x**3 - 239960000*x**2 + 4782399900*x - 31663998001, 1) + num = (7680000000000000000*r1**4*r2**4 - 614323200000000000000*r1**4*r2**3 + + 18458112576000000000000*r1**4*r2**2 - 246896663036160000000000*r1**4*r2 + + 1240473830323209600000000*r1**4 - 614323200000000000000*r1**3*r2**4 + - 1476464424954240000000000*r1**3*r2**2 - 99225501687553535904000000*r1**3 + + 18458112576000000000000*r1**2*r2**4 - 1476464424954240000000000*r1**2*r2**3 + - 593391458458356671712000000*r1**2*r2 + 2981354896834339226880720000*r1**2 + - 246896663036160000000000*r1*r2**4 - 593391458458356671712000000*r1*r2**2 + - 39878756418031796275267195200*r1 + 1240473830323209600000000*r2**4 + - 99225501687553535904000000*r2**3 + 2981354896834339226880720000*r2**2 - + 39878756418031796275267195200*r2 + 200361370275616536577343808012) + mp = (x**3 + 59426520028417434406408556687919*x**2 + + 1161475464966574421163316896737773190861975156439163671112508400*x + + 7467465541178623874454517208254940823818304424383315270991298807299003671748074773558707779600) + assert minimal_polynomial(num, x) == mp + + +def test_minpoly_issue_7574(): + ex = -(-1)**Rational(1, 3) + (-1)**Rational(2,3) + assert minimal_polynomial(ex, x) == x + 1 + + +def test_choose_factor(): + # Test that this does not enter an infinite loop: + bad_factors = [Poly(x-2, x), Poly(x+2, x)] + raises(NotImplementedError, lambda: _choose_factor(bad_factors, x, sqrt(3))) + + +def test_minpoly_fraction_field(): + assert minimal_polynomial(1/x, y) == -x*y + 1 + assert minimal_polynomial(1 / (x + 1), y) == (x + 1)*y - 1 + + assert minimal_polynomial(sqrt(x), y) == y**2 - x + assert minimal_polynomial(sqrt(x + 1), y) == y**2 - x - 1 + assert minimal_polynomial(sqrt(x) / x, y) == x*y**2 - 1 + assert minimal_polynomial(sqrt(2) * sqrt(x), y) == y**2 - 2 * x + assert minimal_polynomial(sqrt(2) + sqrt(x), y) == \ + y**4 + (-2*x - 4)*y**2 + x**2 - 4*x + 4 + + assert minimal_polynomial(x**Rational(1,3), y) == y**3 - x + assert minimal_polynomial(x**Rational(1,3) + sqrt(x), y) == \ + y**6 - 3*x*y**4 - 2*x*y**3 + 3*x**2*y**2 - 6*x**2*y - x**3 + x**2 + + assert minimal_polynomial(sqrt(x) / z, y) == z**2*y**2 - x + assert minimal_polynomial(sqrt(x) / (z + 1), y) == (z**2 + 2*z + 1)*y**2 - x + + assert minimal_polynomial(1/x, y, polys=True) == Poly(-x*y + 1, y, domain='ZZ(x)') + assert minimal_polynomial(1 / (x + 1), y, polys=True) == \ + Poly((x + 1)*y - 1, y, domain='ZZ(x)') + assert minimal_polynomial(sqrt(x), y, polys=True) == Poly(y**2 - x, y, domain='ZZ(x)') + assert minimal_polynomial(sqrt(x) / z, y, polys=True) == \ + Poly(z**2*y**2 - x, y, domain='ZZ(x, z)') + + # this is (sqrt(1 + x**3)/x).integrate(x).diff(x) - sqrt(1 + x**3)/x + a = sqrt(x)/sqrt(1 + x**(-3)) - sqrt(x**3 + 1)/x + 1/(x**Rational(5, 2)* \ + (1 + x**(-3))**Rational(3, 2)) + 1/(x**Rational(11, 2)*(1 + x**(-3))**Rational(3, 2)) + + assert minimal_polynomial(a, y) == y + + raises(NotAlgebraic, lambda: minimal_polynomial(exp(x), y)) + raises(GeneratorsError, lambda: minimal_polynomial(sqrt(x), x)) + raises(GeneratorsError, lambda: minimal_polynomial(sqrt(x) - y, x)) + raises(NotImplementedError, lambda: minimal_polynomial(sqrt(x), y, compose=False)) + +@slow +def test_minpoly_fraction_field_slow(): + assert minimal_polynomial(minimal_polynomial(sqrt(x**Rational(1,5) - 1), + y).subs(y, sqrt(x**Rational(1,5) - 1)), z) == z + +def test_minpoly_domain(): + assert minimal_polynomial(sqrt(2), x, domain=QQ.algebraic_field(sqrt(2))) == \ + x - sqrt(2) + assert minimal_polynomial(sqrt(8), x, domain=QQ.algebraic_field(sqrt(2))) == \ + x - 2*sqrt(2) + assert minimal_polynomial(sqrt(Rational(3,2)), x, + domain=QQ.algebraic_field(sqrt(2))) == 2*x**2 - 3 + + raises(NotAlgebraic, lambda: minimal_polynomial(y, x, domain=QQ)) + + +def test_issue_14831(): + a = -2*sqrt(2)*sqrt(12*sqrt(2) + 17) + assert minimal_polynomial(a, x) == x**2 + 16*x - 8 + e = (-3*sqrt(12*sqrt(2) + 17) + 12*sqrt(2) + + 17 - 2*sqrt(2)*sqrt(12*sqrt(2) + 17)) + assert minimal_polynomial(e, x) == x + + +def test_issue_18248(): + assert nonlinsolve([x*y**3-sqrt(2)/3, x*y**6-4/(9*(sqrt(3)))],x,y) == \ + FiniteSet((sqrt(3)/2, sqrt(6)/3), (sqrt(3)/2, -sqrt(6)/6 - sqrt(2)*I/2), + (sqrt(3)/2, -sqrt(6)/6 + sqrt(2)*I/2)) + + +def test_issue_13230(): + c1 = Circle(Point2D(3, sqrt(5)), 5) + c2 = Circle(Point2D(4, sqrt(7)), 6) + assert intersection(c1, c2) == [Point2D(-1 + (-sqrt(7) + sqrt(5))*(-2*sqrt(7)/29 + + 9*sqrt(5)/29 + sqrt(196*sqrt(35) + 1941)/29), -2*sqrt(7)/29 + 9*sqrt(5)/29 + + sqrt(196*sqrt(35) + 1941)/29), Point2D(-1 + (-sqrt(7) + sqrt(5))*(-sqrt(196*sqrt(35) + + 1941)/29 - 2*sqrt(7)/29 + 9*sqrt(5)/29), -sqrt(196*sqrt(35) + 1941)/29 - 2*sqrt(7)/29 + 9*sqrt(5)/29)] + +def test_issue_19760(): + e = 1/(sqrt(1 + sqrt(2)) - sqrt(2)*sqrt(1 + sqrt(2))) + 1 + mp_expected = x**4 - 4*x**3 + 4*x**2 - 2 + + for comp in (True, False): + mp = Poly(minimal_polynomial(e, compose=comp)) + assert mp(x) == mp_expected, "minimal_polynomial(e, compose=%s) = %s; %s expected" % (comp, mp(x), mp_expected) + + +def test_issue_20163(): + assert apart(1/(x**6+1), extension=[sqrt(3), I]) == \ + (sqrt(3) + I)/(2*x + sqrt(3) + I)/6 + \ + (sqrt(3) - I)/(2*x + sqrt(3) - I)/6 - \ + (sqrt(3) - I)/(2*x - sqrt(3) + I)/6 - \ + (sqrt(3) + I)/(2*x - sqrt(3) - I)/6 + \ + I/(x + I)/6 - I/(x - I)/6 + + +def test_issue_22559(): + alpha = AlgebraicNumber(sqrt(2)) + assert minimal_polynomial(alpha**3, x) == x**2 - 8 + + +def test_issue_22561(): + a = AlgebraicNumber(sqrt(2) + sqrt(3), [S(1) / 2, 0, S(-9) / 2, 0], gen=x) + assert a.as_expr() == sqrt(2) + assert minimal_polynomial(a, x) == x**2 - 2 + assert minimal_polynomial(a**3, x) == x**2 - 8 + + +def test_separate_sq_not_impl(): + raises(NotImplementedError, lambda: _separate_sq(x**(S(1)/3) + x)) + + +def test_minpoly_op_algebraic_element_not_impl(): + raises(NotImplementedError, + lambda: _minpoly_op_algebraic_element(Pow, sqrt(2), sqrt(3), x, QQ)) + + +def test_minpoly_groebner(): + assert _minpoly_groebner(S(2)/3, x, Poly) == 3*x - 2 + assert _minpoly_groebner( + (sqrt(2) + 3)*(sqrt(2) + 1), x, Poly) == x**2 - 10*x - 7 + assert _minpoly_groebner((sqrt(2) + 3)**(S(1)/3)*(sqrt(2) + 1)**(S(1)/3), + x, Poly) == x**6 - 10*x**3 - 7 + assert _minpoly_groebner((sqrt(2) + 3)**(-S(1)/3)*(sqrt(2) + 1)**(S(1)/3), + x, Poly) == 7*x**6 - 2*x**3 - 1 + raises(NotAlgebraic, lambda: _minpoly_groebner(pi**2, x, Poly)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_modules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_modules.py new file mode 100644 index 0000000000000000000000000000000000000000..f3c61c98e33d3c78e79eeed45efcfa1f74478645 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_modules.py @@ -0,0 +1,752 @@ +from sympy.abc import x, zeta +from sympy.polys import Poly, cyclotomic_poly +from sympy.polys.domains import FF, QQ, ZZ +from sympy.polys.matrices import DomainMatrix, DM +from sympy.polys.numberfields.exceptions import ( + ClosureFailure, MissingUnityError, StructureError +) +from sympy.polys.numberfields.modules import ( + Module, ModuleElement, ModuleEndomorphism, PowerBasis, PowerBasisElement, + find_min_poly, is_sq_maxrank_HNF, make_mod_elt, to_col, +) +from sympy.polys.numberfields.utilities import is_int +from sympy.polys.polyerrors import UnificationFailed +from sympy.testing.pytest import raises + + +def test_to_col(): + c = [1, 2, 3, 4] + m = to_col(c) + assert m.domain.is_ZZ + assert m.shape == (4, 1) + assert m.flat() == c + + +def test_Module_NotImplemented(): + M = Module() + raises(NotImplementedError, lambda: M.n) + raises(NotImplementedError, lambda: M.mult_tab()) + raises(NotImplementedError, lambda: M.represent(None)) + raises(NotImplementedError, lambda: M.starts_with_unity()) + raises(NotImplementedError, lambda: M.element_from_rational(QQ(2, 3))) + + +def test_Module_ancestors(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = B.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + D = B.submodule_from_matrix(5 * DomainMatrix.eye(4, ZZ)) + assert C.ancestors(include_self=True) == [A, B, C] + assert D.ancestors(include_self=True) == [A, B, D] + assert C.power_basis_ancestor() == A + assert C.nearest_common_ancestor(D) == B + M = Module() + assert M.power_basis_ancestor() is None + + +def test_Module_compat_col(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + col = to_col([1, 2, 3, 4]) + row = col.transpose() + assert A.is_compat_col(col) is True + assert A.is_compat_col(row) is False + assert A.is_compat_col(1) is False + assert A.is_compat_col(DomainMatrix.eye(3, ZZ)[:, 0]) is False + assert A.is_compat_col(DomainMatrix.eye(4, QQ)[:, 0]) is False + assert A.is_compat_col(DomainMatrix.eye(4, ZZ)[:, 0]) is True + + +def test_Module_call(): + T = Poly(cyclotomic_poly(5, x)) + B = PowerBasis(T) + assert B(0).col.flat() == [1, 0, 0, 0] + assert B(1).col.flat() == [0, 1, 0, 0] + col = DomainMatrix.eye(4, ZZ)[:, 2] + assert B(col).col == col + raises(ValueError, lambda: B(-1)) + + +def test_Module_starts_with_unity(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + assert A.starts_with_unity() is True + assert B.starts_with_unity() is False + + +def test_Module_basis_elements(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + basis = B.basis_elements() + bp = B.basis_element_pullbacks() + for i, (e, p) in enumerate(zip(basis, bp)): + c = [0] * 4 + assert e.module == B + assert p.module == A + c[i] = 1 + assert e == B(to_col(c)) + c[i] = 2 + assert p == A(to_col(c)) + + +def test_Module_zero(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + assert A.zero().col.flat() == [0, 0, 0, 0] + assert A.zero().module == A + assert B.zero().col.flat() == [0, 0, 0, 0] + assert B.zero().module == B + + +def test_Module_one(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + assert A.one().col.flat() == [1, 0, 0, 0] + assert A.one().module == A + assert B.one().col.flat() == [1, 0, 0, 0] + assert B.one().module == A + + +def test_Module_element_from_rational(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + rA = A.element_from_rational(QQ(22, 7)) + rB = B.element_from_rational(QQ(22, 7)) + assert rA.coeffs == [22, 0, 0, 0] + assert rA.denom == 7 + assert rA.module == A + assert rB.coeffs == [22, 0, 0, 0] + assert rB.denom == 7 + assert rB.module == A + + +def test_Module_submodule_from_gens(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + gens = [2*A(0), 2*A(1), 6*A(0), 6*A(1)] + B = A.submodule_from_gens(gens) + # Because the 3rd and 4th generators do not add anything new, we expect + # the cols of the matrix of B to just reproduce the first two gens: + M = gens[0].column().hstack(gens[1].column()) + assert B.matrix == M + # At least one generator must be provided: + raises(ValueError, lambda: A.submodule_from_gens([])) + # All generators must belong to A: + raises(ValueError, lambda: A.submodule_from_gens([3*A(0), B(0)])) + + +def test_Module_submodule_from_matrix(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + e = B(to_col([1, 2, 3, 4])) + f = e.to_parent() + assert f.col.flat() == [2, 4, 6, 8] + # Matrix must be over ZZ: + raises(ValueError, lambda: A.submodule_from_matrix(DomainMatrix.eye(4, QQ))) + # Number of rows of matrix must equal number of generators of module A: + raises(ValueError, lambda: A.submodule_from_matrix(2 * DomainMatrix.eye(5, ZZ))) + + +def test_Module_whole_submodule(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.whole_submodule() + e = B(to_col([1, 2, 3, 4])) + f = e.to_parent() + assert f.col.flat() == [1, 2, 3, 4] + e0, e1, e2, e3 = B(0), B(1), B(2), B(3) + assert e2 * e3 == e0 + assert e3 ** 2 == e1 + + +def test_PowerBasis_repr(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + assert repr(A) == 'PowerBasis(x**4 + x**3 + x**2 + x + 1)' + + +def test_PowerBasis_eq(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = PowerBasis(T) + assert A == B + + +def test_PowerBasis_mult_tab(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + M = A.mult_tab() + exp = {0: {0: [1, 0, 0, 0], 1: [0, 1, 0, 0], 2: [0, 0, 1, 0], 3: [0, 0, 0, 1]}, + 1: {1: [0, 0, 1, 0], 2: [0, 0, 0, 1], 3: [-1, -1, -1, -1]}, + 2: {2: [-1, -1, -1, -1], 3: [1, 0, 0, 0]}, + 3: {3: [0, 1, 0, 0]}} + # We get the table we expect: + assert M == exp + # And all entries are of expected type: + assert all(is_int(c) for u in M for v in M[u] for c in M[u][v]) + + +def test_PowerBasis_represent(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + col = to_col([1, 2, 3, 4]) + a = A(col) + assert A.represent(a) == col + b = A(col, denom=2) + raises(ClosureFailure, lambda: A.represent(b)) + + +def test_PowerBasis_element_from_poly(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + f = Poly(1 + 2*x) + g = Poly(x**4) + h = Poly(0, x) + assert A.element_from_poly(f).coeffs == [1, 2, 0, 0] + assert A.element_from_poly(g).coeffs == [-1, -1, -1, -1] + assert A.element_from_poly(h).coeffs == [0, 0, 0, 0] + + +def test_PowerBasis_element__conversions(): + k = QQ.cyclotomic_field(5) + L = QQ.cyclotomic_field(7) + B = PowerBasis(k) + + # ANP --> PowerBasisElement + a = k([QQ(1, 2), QQ(1, 3), 5, 7]) + e = B.element_from_ANP(a) + assert e.coeffs == [42, 30, 2, 3] + assert e.denom == 6 + + # PowerBasisElement --> ANP + assert e.to_ANP() == a + + # Cannot convert ANP from different field + d = L([QQ(1, 2), QQ(1, 3), 5, 7]) + raises(UnificationFailed, lambda: B.element_from_ANP(d)) + + # AlgebraicNumber --> PowerBasisElement + alpha = k.to_alg_num(a) + eps = B.element_from_alg_num(alpha) + assert eps.coeffs == [42, 30, 2, 3] + assert eps.denom == 6 + + # PowerBasisElement --> AlgebraicNumber + assert eps.to_alg_num() == alpha + + # Cannot convert AlgebraicNumber from different field + delta = L.to_alg_num(d) + raises(UnificationFailed, lambda: B.element_from_alg_num(delta)) + + # When we don't know the field: + C = PowerBasis(k.ext.minpoly) + # Can convert from AlgebraicNumber: + eps = C.element_from_alg_num(alpha) + assert eps.coeffs == [42, 30, 2, 3] + assert eps.denom == 6 + # But can't convert back: + raises(StructureError, lambda: eps.to_alg_num()) + + +def test_Submodule_repr(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ), denom=3) + assert repr(B) == 'Submodule[[2, 0, 0, 0], [0, 2, 0, 0], [0, 0, 2, 0], [0, 0, 0, 2]]/3' + + +def test_Submodule_reduced(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = A.submodule_from_matrix(6 * DomainMatrix.eye(4, ZZ), denom=3) + D = C.reduced() + assert D.denom == 1 and D == C == B + + +def test_Submodule_discard_before(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + B.compute_mult_tab() + C = B.discard_before(2) + assert C.parent == B.parent + assert B.is_sq_maxrank_HNF() and not C.is_sq_maxrank_HNF() + assert C.matrix == B.matrix[:, 2:] + assert C.mult_tab() == {0: {0: [-2, -2], 1: [0, 0]}, 1: {1: [0, 0]}} + + +def test_Submodule_QQ_matrix(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = A.submodule_from_matrix(6 * DomainMatrix.eye(4, ZZ), denom=3) + assert C.QQ_matrix == B.QQ_matrix + + +def test_Submodule_represent(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = B.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + a0 = A(to_col([6, 12, 18, 24])) + a1 = A(to_col([2, 4, 6, 8])) + a2 = A(to_col([1, 3, 5, 7])) + + b1 = B.represent(a1) + assert b1.flat() == [1, 2, 3, 4] + + c0 = C.represent(a0) + assert c0.flat() == [1, 2, 3, 4] + + Y = A.submodule_from_matrix(DomainMatrix([ + [1, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0], + ], (3, 4), ZZ).transpose()) + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + z0 = Z(to_col([1, 2, 3, 4, 5, 6])) + + raises(ClosureFailure, lambda: Y.represent(A(3))) + raises(ClosureFailure, lambda: B.represent(a2)) + raises(ClosureFailure, lambda: B.represent(z0)) + + +def test_Submodule_is_compat_submodule(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + D = C.submodule_from_matrix(5 * DomainMatrix.eye(4, ZZ)) + assert B.is_compat_submodule(C) is True + assert B.is_compat_submodule(A) is False + assert B.is_compat_submodule(D) is False + + +def test_Submodule_eq(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = A.submodule_from_matrix(6 * DomainMatrix.eye(4, ZZ), denom=3) + assert C == B + + +def test_Submodule_add(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(DomainMatrix([ + [4, 0, 0, 0], + [0, 4, 0, 0], + ], (2, 4), ZZ).transpose(), denom=6) + C = A.submodule_from_matrix(DomainMatrix([ + [0, 10, 0, 0], + [0, 0, 7, 0], + ], (2, 4), ZZ).transpose(), denom=15) + D = A.submodule_from_matrix(DomainMatrix([ + [20, 0, 0, 0], + [ 0, 20, 0, 0], + [ 0, 0, 14, 0], + ], (3, 4), ZZ).transpose(), denom=30) + assert B + C == D + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + Y = Z.submodule_from_gens([Z(0), Z(1)]) + raises(TypeError, lambda: B + Y) + + +def test_Submodule_mul(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + C = A.submodule_from_matrix(DomainMatrix([ + [0, 10, 0, 0], + [0, 0, 7, 0], + ], (2, 4), ZZ).transpose(), denom=15) + C1 = A.submodule_from_matrix(DomainMatrix([ + [0, 20, 0, 0], + [0, 0, 14, 0], + ], (2, 4), ZZ).transpose(), denom=3) + C2 = A.submodule_from_matrix(DomainMatrix([ + [0, 0, 10, 0], + [0, 0, 0, 7], + ], (2, 4), ZZ).transpose(), denom=15) + C3_unred = A.submodule_from_matrix(DomainMatrix([ + [0, 0, 100, 0], + [0, 0, 0, 70], + [0, 0, 0, 70], + [-49, -49, -49, -49] + ], (4, 4), ZZ).transpose(), denom=225) + C3 = A.submodule_from_matrix(DomainMatrix([ + [4900, 4900, 0, 0], + [4410, 4410, 10, 0], + [2107, 2107, 7, 7] + ], (3, 4), ZZ).transpose(), denom=225) + assert C * 1 == C + assert C ** 1 == C + assert C * 10 == C1 + assert C * A(1) == C2 + assert C.mul(C, hnf=False) == C3_unred + assert C * C == C3 + assert C ** 2 == C3 + + +def test_Submodule_reduce_element(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.whole_submodule() + b = B(to_col([90, 84, 80, 75]), denom=120) + + C = B.submodule_from_matrix(DomainMatrix.eye(4, ZZ), denom=2) + b_bar_expected = B(to_col([30, 24, 20, 15]), denom=120) + b_bar = C.reduce_element(b) + assert b_bar == b_bar_expected + + C = B.submodule_from_matrix(DomainMatrix.eye(4, ZZ), denom=4) + b_bar_expected = B(to_col([0, 24, 20, 15]), denom=120) + b_bar = C.reduce_element(b) + assert b_bar == b_bar_expected + + C = B.submodule_from_matrix(DomainMatrix.eye(4, ZZ), denom=8) + b_bar_expected = B(to_col([0, 9, 5, 0]), denom=120) + b_bar = C.reduce_element(b) + assert b_bar == b_bar_expected + + a = A(to_col([1, 2, 3, 4])) + raises(NotImplementedError, lambda: C.reduce_element(a)) + + C = B.submodule_from_matrix(DomainMatrix([ + [5, 4, 3, 2], + [0, 8, 7, 6], + [0, 0,11,12], + [0, 0, 0, 1] + ], (4, 4), ZZ).transpose()) + raises(StructureError, lambda: C.reduce_element(b)) + + +def test_is_HNF(): + M = DM([ + [3, 2, 1], + [0, 2, 1], + [0, 0, 1] + ], ZZ) + M1 = DM([ + [3, 2, 1], + [0, -2, 1], + [0, 0, 1] + ], ZZ) + M2 = DM([ + [3, 2, 3], + [0, 2, 1], + [0, 0, 1] + ], ZZ) + assert is_sq_maxrank_HNF(M) is True + assert is_sq_maxrank_HNF(M1) is False + assert is_sq_maxrank_HNF(M2) is False + + +def test_make_mod_elt(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + col = to_col([1, 2, 3, 4]) + eA = make_mod_elt(A, col) + eB = make_mod_elt(B, col) + assert isinstance(eA, PowerBasisElement) + assert not isinstance(eB, PowerBasisElement) + + +def test_ModuleElement_repr(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 2, 3, 4]), denom=2) + assert repr(e) == '[1, 2, 3, 4]/2' + + +def test_ModuleElement_reduced(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([2, 4, 6, 8]), denom=2) + f = e.reduced() + assert f.denom == 1 and f == e + + +def test_ModuleElement_reduced_mod_p(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([20, 40, 60, 80])) + f = e.reduced_mod_p(7) + assert f.coeffs == [-1, -2, -3, 3] + + +def test_ModuleElement_from_int_list(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + c = [1, 2, 3, 4] + assert ModuleElement.from_int_list(A, c).coeffs == c + + +def test_ModuleElement_len(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(0) + assert len(e) == 4 + + +def test_ModuleElement_column(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(0) + col1 = e.column() + assert col1 == e.col and col1 is not e.col + col2 = e.column(domain=FF(5)) + assert col2.domain.is_FF + + +def test_ModuleElement_QQ_col(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 2, 3, 4]), denom=1) + f = A(to_col([3, 6, 9, 12]), denom=3) + assert e.QQ_col == f.QQ_col + + +def test_ModuleElement_to_ancestors(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = B.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + D = C.submodule_from_matrix(5 * DomainMatrix.eye(4, ZZ)) + eD = D(0) + eC = eD.to_parent() + eB = eD.to_ancestor(B) + eA = eD.over_power_basis() + assert eC.module is C and eC.coeffs == [5, 0, 0, 0] + assert eB.module is B and eB.coeffs == [15, 0, 0, 0] + assert eA.module is A and eA.coeffs == [30, 0, 0, 0] + + a = A(0) + raises(ValueError, lambda: a.to_parent()) + + +def test_ModuleElement_compatibility(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = B.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + D = B.submodule_from_matrix(5 * DomainMatrix.eye(4, ZZ)) + assert C(0).is_compat(C(1)) is True + assert C(0).is_compat(D(0)) is False + u, v = C(0).unify(D(0)) + assert u.module is B and v.module is B + assert C(C.represent(u)) == C(0) and D(D.represent(v)) == D(0) + + u, v = C(0).unify(C(1)) + assert u == C(0) and v == C(1) + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + raises(UnificationFailed, lambda: C(0).unify(Z(1))) + + +def test_ModuleElement_eq(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 2, 3, 4]), denom=1) + f = A(to_col([3, 6, 9, 12]), denom=3) + assert e == f + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + assert e != Z(0) + assert e != 3.14 + + +def test_ModuleElement_equiv(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 2, 3, 4]), denom=1) + f = A(to_col([3, 6, 9, 12]), denom=3) + assert e.equiv(f) + + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + g = C(to_col([1, 2, 3, 4]), denom=1) + h = A(to_col([3, 6, 9, 12]), denom=1) + assert g.equiv(h) + assert C(to_col([5, 0, 0, 0]), denom=7).equiv(QQ(15, 7)) + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + raises(UnificationFailed, lambda: e.equiv(Z(0))) + + assert e.equiv(3.14) is False + + +def test_ModuleElement_add(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + e = A(to_col([1, 2, 3, 4]), denom=6) + f = A(to_col([5, 6, 7, 8]), denom=10) + g = C(to_col([1, 1, 1, 1]), denom=2) + assert e + f == A(to_col([10, 14, 18, 22]), denom=15) + assert e - f == A(to_col([-5, -4, -3, -2]), denom=15) + assert e + g == A(to_col([10, 11, 12, 13]), denom=6) + assert e + QQ(7, 10) == A(to_col([26, 10, 15, 20]), denom=30) + assert g + QQ(7, 10) == A(to_col([22, 15, 15, 15]), denom=10) + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + raises(TypeError, lambda: e + Z(0)) + raises(TypeError, lambda: e + 3.14) + + +def test_ModuleElement_mul(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + e = A(to_col([0, 2, 0, 0]), denom=3) + f = A(to_col([0, 0, 0, 7]), denom=5) + g = C(to_col([0, 0, 0, 1]), denom=2) + h = A(to_col([0, 0, 3, 1]), denom=7) + assert e * f == A(to_col([-14, -14, -14, -14]), denom=15) + assert e * g == A(to_col([-1, -1, -1, -1])) + assert e * h == A(to_col([-2, -2, -2, 4]), denom=21) + assert e * QQ(6, 5) == A(to_col([0, 4, 0, 0]), denom=5) + assert (g * QQ(10, 21)).equiv(A(to_col([0, 0, 0, 5]), denom=7)) + assert e // QQ(6, 5) == A(to_col([0, 5, 0, 0]), denom=9) + + U = Poly(cyclotomic_poly(7, x)) + Z = PowerBasis(U) + raises(TypeError, lambda: e * Z(0)) + raises(TypeError, lambda: e * 3.14) + raises(TypeError, lambda: e // 3.14) + raises(ZeroDivisionError, lambda: e // 0) + + +def test_ModuleElement_div(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + e = A(to_col([0, 2, 0, 0]), denom=3) + f = A(to_col([0, 0, 0, 7]), denom=5) + g = C(to_col([1, 1, 1, 1])) + assert e // f == 10*A(3)//21 + assert e // g == -2*A(2)//9 + assert 3 // g == -A(1) + + +def test_ModuleElement_pow(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + C = A.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + e = A(to_col([0, 2, 0, 0]), denom=3) + g = C(to_col([0, 0, 0, 1]), denom=2) + assert e ** 3 == A(to_col([0, 0, 0, 8]), denom=27) + assert g ** 2 == C(to_col([0, 3, 0, 0]), denom=4) + assert e ** 0 == A(to_col([1, 0, 0, 0])) + assert g ** 0 == A(to_col([1, 0, 0, 0])) + assert e ** 1 == e + assert g ** 1 == g + + +def test_ModuleElement_mod(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 15, 8, 0]), denom=2) + assert e % 7 == A(to_col([1, 1, 8, 0]), denom=2) + assert e % QQ(1, 2) == A.zero() + assert e % QQ(1, 3) == A(to_col([1, 1, 0, 0]), denom=6) + + B = A.submodule_from_gens([A(0), 5*A(1), 3*A(2), A(3)]) + assert e % B == A(to_col([1, 5, 2, 0]), denom=2) + + C = B.whole_submodule() + raises(TypeError, lambda: e % C) + + +def test_PowerBasisElement_polys(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 15, 8, 0]), denom=2) + assert e.numerator(x=zeta) == Poly(8 * zeta ** 2 + 15 * zeta + 1, domain=ZZ) + assert e.poly(x=zeta) == Poly(4 * zeta ** 2 + QQ(15, 2) * zeta + QQ(1, 2), domain=QQ) + + +def test_PowerBasisElement_norm(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + lam = A(to_col([1, -1, 0, 0])) + assert lam.norm() == 5 + + +def test_PowerBasisElement_inverse(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + e = A(to_col([1, 1, 1, 1])) + assert 2 // e == -2*A(1) + assert e ** -3 == -A(3) + + +def test_ModuleHomomorphism_matrix(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + phi = ModuleEndomorphism(A, lambda a: a ** 2) + M = phi.matrix() + assert M == DomainMatrix([ + [1, 0, -1, 0], + [0, 0, -1, 1], + [0, 1, -1, 0], + [0, 0, -1, 0] + ], (4, 4), ZZ) + + +def test_ModuleHomomorphism_kernel(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + phi = ModuleEndomorphism(A, lambda a: a ** 5) + N = phi.kernel() + assert N.n == 3 + + +def test_EndomorphismRing_represent(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + R = A.endomorphism_ring() + phi = R.inner_endomorphism(A(1)) + col = R.represent(phi) + assert col.transpose() == DomainMatrix([ + [0, 1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1, -1, -1, -1, -1] + ], (1, 16), ZZ) + + B = A.submodule_from_matrix(DomainMatrix.zeros((4, 0), ZZ)) + S = B.endomorphism_ring() + psi = S.inner_endomorphism(A(1)) + col = S.represent(psi) + assert col == DomainMatrix([], (0, 0), ZZ) + + raises(NotImplementedError, lambda: R.represent(3.14)) + + +def test_find_min_poly(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + powers = [] + m = find_min_poly(A(1), QQ, x=x, powers=powers) + assert m == Poly(T, domain=QQ) + assert len(powers) == 5 + + # powers list need not be passed + m = find_min_poly(A(1), QQ, x=x) + assert m == Poly(T, domain=QQ) + + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + raises(MissingUnityError, lambda: find_min_poly(B(1), QQ)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_numbers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..f8f350719cc740901a29d03e45ae9f3978446f31 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_numbers.py @@ -0,0 +1,202 @@ +"""Tests on algebraic numbers. """ + +from sympy.core.containers import Tuple +from sympy.core.numbers import (AlgebraicNumber, I, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys.polytools import Poly +from sympy.polys.numberfields.subfield import to_number_field +from sympy.polys.polyclasses import DMP +from sympy.polys.domains import QQ +from sympy.polys.rootoftools import CRootOf +from sympy.abc import x, y + + +def test_AlgebraicNumber(): + minpoly, root = x**2 - 2, sqrt(2) + + a = AlgebraicNumber(root, gen=x) + + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + assert a.root == root + assert a.alias is None + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is False + + assert a.coeffs() == [S.One, S.Zero] + assert a.native_coeffs() == [QQ(1), QQ(0)] + + a = AlgebraicNumber(root, gen=x, alias='y') + + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + assert a.root == root + assert a.alias == Symbol('y') + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is True + + a = AlgebraicNumber(root, gen=x, alias=Symbol('y')) + + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + assert a.root == root + assert a.alias == Symbol('y') + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is True + + assert AlgebraicNumber(sqrt(2), []).rep == DMP([], QQ) + assert AlgebraicNumber(sqrt(2), ()).rep == DMP([], QQ) + assert AlgebraicNumber(sqrt(2), (0, 0)).rep == DMP([], QQ) + + assert AlgebraicNumber(sqrt(2), [8]).rep == DMP([QQ(8)], QQ) + assert AlgebraicNumber(sqrt(2), [Rational(8, 3)]).rep == DMP([QQ(8, 3)], QQ) + + assert AlgebraicNumber(sqrt(2), [7, 3]).rep == DMP([QQ(7), QQ(3)], QQ) + assert AlgebraicNumber( + sqrt(2), [Rational(7, 9), Rational(3, 2)]).rep == DMP([QQ(7, 9), QQ(3, 2)], QQ) + + assert AlgebraicNumber(sqrt(2), [1, 2, 3]).rep == DMP([QQ(2), QQ(5)], QQ) + + a = AlgebraicNumber(AlgebraicNumber(root, gen=x), [1, 2]) + + assert a.rep == DMP([QQ(1), QQ(2)], QQ) + assert a.root == root + assert a.alias is None + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is False + + assert a.coeffs() == [S.One, S(2)] + assert a.native_coeffs() == [QQ(1), QQ(2)] + + a = AlgebraicNumber((minpoly, root), [1, 2]) + + assert a.rep == DMP([QQ(1), QQ(2)], QQ) + assert a.root == root + assert a.alias is None + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is False + + a = AlgebraicNumber((Poly(minpoly), root), [1, 2]) + + assert a.rep == DMP([QQ(1), QQ(2)], QQ) + assert a.root == root + assert a.alias is None + assert a.minpoly == minpoly + assert a.is_number + + assert a.is_aliased is False + + assert AlgebraicNumber( sqrt(3)).rep == DMP([ QQ(1), QQ(0)], QQ) + assert AlgebraicNumber(-sqrt(3)).rep == DMP([ QQ(1), QQ(0)], QQ) + + a = AlgebraicNumber(sqrt(2)) + b = AlgebraicNumber(sqrt(2)) + + assert a == b + + c = AlgebraicNumber(sqrt(2), gen=x) + + assert a == b + assert a == c + + a = AlgebraicNumber(sqrt(2), [1, 2]) + b = AlgebraicNumber(sqrt(2), [1, 3]) + + assert a != b and a != sqrt(2) + 3 + + assert (a == x) is False and (a != x) is True + + a = AlgebraicNumber(sqrt(2), [1, 0]) + b = AlgebraicNumber(sqrt(2), [1, 0], alias=y) + + assert a.as_poly(x) == Poly(x, domain='QQ') + assert b.as_poly() == Poly(y, domain='QQ') + + assert a.as_expr() == sqrt(2) + assert a.as_expr(x) == x + assert b.as_expr() == sqrt(2) + assert b.as_expr(x) == x + + a = AlgebraicNumber(sqrt(2), [2, 3]) + b = AlgebraicNumber(sqrt(2), [2, 3], alias=y) + + p = a.as_poly() + + assert p == Poly(2*p.gen + 3) + + assert a.as_poly(x) == Poly(2*x + 3, domain='QQ') + assert b.as_poly() == Poly(2*y + 3, domain='QQ') + + assert a.as_expr() == 2*sqrt(2) + 3 + assert a.as_expr(x) == 2*x + 3 + assert b.as_expr() == 2*sqrt(2) + 3 + assert b.as_expr(x) == 2*x + 3 + + a = AlgebraicNumber(sqrt(2)) + b = to_number_field(sqrt(2)) + assert a.args == b.args == (sqrt(2), Tuple(1, 0)) + b = AlgebraicNumber(sqrt(2), alias='alpha') + assert b.args == (sqrt(2), Tuple(1, 0), Symbol('alpha')) + + a = AlgebraicNumber(sqrt(2), [1, 2, 3]) + assert a.args == (sqrt(2), Tuple(1, 2, 3)) + + a = AlgebraicNumber(sqrt(2), [1, 2], "alpha") + b = AlgebraicNumber(a) + c = AlgebraicNumber(a, alias="gamma") + assert a == b + assert c.alias.name == "gamma" + + a = AlgebraicNumber(sqrt(2) + sqrt(3), [S(1)/2, 0, S(-9)/2, 0]) + b = AlgebraicNumber(a, [1, 0, 0]) + assert b.root == a.root + assert a.to_root() == sqrt(2) + assert b.to_root() == 2 + + a = AlgebraicNumber(2) + assert a.is_primitive_element is True + + +def test_to_algebraic_integer(): + a = AlgebraicNumber(sqrt(3), gen=x).to_algebraic_integer() + + assert a.minpoly == x**2 - 3 + assert a.root == sqrt(3) + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + + a = AlgebraicNumber(2*sqrt(3), gen=x).to_algebraic_integer() + assert a.minpoly == x**2 - 12 + assert a.root == 2*sqrt(3) + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + + a = AlgebraicNumber(sqrt(3)/2, gen=x).to_algebraic_integer() + + assert a.minpoly == x**2 - 12 + assert a.root == 2*sqrt(3) + assert a.rep == DMP([QQ(1), QQ(0)], QQ) + + a = AlgebraicNumber(sqrt(3)/2, [Rational(7, 19), 3], gen=x).to_algebraic_integer() + + assert a.minpoly == x**2 - 12 + assert a.root == 2*sqrt(3) + assert a.rep == DMP([QQ(7, 19), QQ(3)], QQ) + + +def test_AlgebraicNumber_to_root(): + assert AlgebraicNumber(sqrt(2)).to_root() == sqrt(2) + + zeta5_squared = AlgebraicNumber(CRootOf(x**5 - 1, 4), coeffs=[1, 0, 0]) + assert zeta5_squared.to_root() == CRootOf(x**4 + x**3 + x**2 + x + 1, 1) + + zeta3_squared = AlgebraicNumber(CRootOf(x**3 - 1, 2), coeffs=[1, 0, 0]) + assert zeta3_squared.to_root() == -S(1)/2 - sqrt(3)*I/2 + assert zeta3_squared.to_root(radicals=False) == CRootOf(x**2 + x + 1, 0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_primes.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_primes.py new file mode 100644 index 0000000000000000000000000000000000000000..f121d60d272fe65345de773748828a8a67eb0028 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_primes.py @@ -0,0 +1,296 @@ +from math import prod + +from sympy import QQ, ZZ +from sympy.abc import x, theta +from sympy.ntheory import factorint +from sympy.ntheory.residue_ntheory import n_order +from sympy.polys import Poly, cyclotomic_poly +from sympy.polys.matrices import DomainMatrix +from sympy.polys.numberfields.basis import round_two +from sympy.polys.numberfields.exceptions import StructureError +from sympy.polys.numberfields.modules import PowerBasis, to_col +from sympy.polys.numberfields.primes import ( + prime_decomp, _two_elt_rep, + _check_formal_conditions_for_maximal_order, +) +from sympy.testing.pytest import raises + + +def test_check_formal_conditions_for_maximal_order(): + T = Poly(cyclotomic_poly(5, x)) + A = PowerBasis(T) + B = A.submodule_from_matrix(2 * DomainMatrix.eye(4, ZZ)) + C = B.submodule_from_matrix(3 * DomainMatrix.eye(4, ZZ)) + D = A.submodule_from_matrix(DomainMatrix.eye(4, ZZ)[:, :-1]) + # Is a direct submodule of a power basis, but lacks 1 as first generator: + raises(StructureError, lambda: _check_formal_conditions_for_maximal_order(B)) + # Is not a direct submodule of a power basis: + raises(StructureError, lambda: _check_formal_conditions_for_maximal_order(C)) + # Is direct submod of pow basis, and starts with 1, but not sq/max rank/HNF: + raises(StructureError, lambda: _check_formal_conditions_for_maximal_order(D)) + + +def test_two_elt_rep(): + ell = 7 + T = Poly(cyclotomic_poly(ell)) + ZK, dK = round_two(T) + for p in [29, 13, 11, 5]: + P = prime_decomp(p, T) + for Pi in P: + # We have Pi in two-element representation, and, because we are + # looking at a cyclotomic field, this was computed by the "easy" + # method that just factors T mod p. We will now convert this to + # a set of Z-generators, then convert that back into a two-element + # rep. The latter need not be identical to the two-elt rep we + # already have, but it must have the same HNF. + H = p*ZK + Pi.alpha*ZK + gens = H.basis_element_pullbacks() + # Note: we could supply f = Pi.f, but prefer to test behavior without it. + b = _two_elt_rep(gens, ZK, p) + if b != Pi.alpha: + H2 = p*ZK + b*ZK + assert H2 == H + + +def test_valuation_at_prime_ideal(): + p = 7 + T = Poly(cyclotomic_poly(p)) + ZK, dK = round_two(T) + P = prime_decomp(p, T, dK=dK, ZK=ZK) + assert len(P) == 1 + P0 = P[0] + v = P0.valuation(p*ZK) + assert v == P0.e + # Test easy 0 case: + assert P0.valuation(5*ZK) == 0 + + +def test_decomp_1(): + # All prime decompositions in cyclotomic fields are in the "easy case," + # since the index is unity. + # Here we check the ramified prime. + T = Poly(cyclotomic_poly(7)) + raises(ValueError, lambda: prime_decomp(7)) + P = prime_decomp(7, T) + assert len(P) == 1 + P0 = P[0] + assert P0.e == 6 + assert P0.f == 1 + # Test powers: + assert P0**0 == P0.ZK + assert P0**1 == P0 + assert P0**6 == 7 * P0.ZK + + +def test_decomp_2(): + # More easy cyclotomic cases, but here we check unramified primes. + ell = 7 + T = Poly(cyclotomic_poly(ell)) + for p in [29, 13, 11, 5]: + f_exp = n_order(p, ell) + g_exp = (ell - 1) // f_exp + P = prime_decomp(p, T) + assert len(P) == g_exp + for Pi in P: + assert Pi.e == 1 + assert Pi.f == f_exp + + +def test_decomp_3(): + T = Poly(x ** 2 - 35) + rad = {} + ZK, dK = round_two(T, radicals=rad) + # 35 is 3 mod 4, so field disc is 4*5*7, and theory says each of the + # rational primes 2, 5, 7 should be the square of a prime ideal. + for p in [2, 5, 7]: + P = prime_decomp(p, T, dK=dK, ZK=ZK, radical=rad.get(p)) + assert len(P) == 1 + assert P[0].e == 2 + assert P[0]**2 == p*ZK + + +def test_decomp_4(): + T = Poly(x ** 2 - 21) + rad = {} + ZK, dK = round_two(T, radicals=rad) + # 21 is 1 mod 4, so field disc is 3*7, and theory says the + # rational primes 3, 7 should be the square of a prime ideal. + for p in [3, 7]: + P = prime_decomp(p, T, dK=dK, ZK=ZK, radical=rad.get(p)) + assert len(P) == 1 + assert P[0].e == 2 + assert P[0]**2 == p*ZK + + +def test_decomp_5(): + # Here is our first test of the "hard case" of prime decomposition. + # We work in a quadratic extension Q(sqrt(d)) where d is 1 mod 4, and + # we consider the factorization of the rational prime 2, which divides + # the index. + # Theory says the form of p's factorization depends on the residue of + # d mod 8, so we consider both cases, d = 1 mod 8 and d = 5 mod 8. + for d in [-7, -3]: + T = Poly(x ** 2 - d) + rad = {} + ZK, dK = round_two(T, radicals=rad) + p = 2 + P = prime_decomp(p, T, dK=dK, ZK=ZK, radical=rad.get(p)) + if d % 8 == 1: + assert len(P) == 2 + assert all(P[i].e == 1 and P[i].f == 1 for i in range(2)) + assert prod(Pi**Pi.e for Pi in P) == p * ZK + else: + assert d % 8 == 5 + assert len(P) == 1 + assert P[0].e == 1 + assert P[0].f == 2 + assert P[0].as_submodule() == p * ZK + + +def test_decomp_6(): + # Another case where 2 divides the index. This is Dedekind's example of + # an essential discriminant divisor. (See Cohen, Exercise 6.10.) + T = Poly(x ** 3 + x ** 2 - 2 * x + 8) + rad = {} + ZK, dK = round_two(T, radicals=rad) + p = 2 + P = prime_decomp(p, T, dK=dK, ZK=ZK, radical=rad.get(p)) + assert len(P) == 3 + assert all(Pi.e == Pi.f == 1 for Pi in P) + assert prod(Pi**Pi.e for Pi in P) == p*ZK + + +def test_decomp_7(): + # Try working through an AlgebraicField + T = Poly(x ** 3 + x ** 2 - 2 * x + 8) + K = QQ.alg_field_from_poly(T) + p = 2 + P = K.primes_above(p) + ZK = K.maximal_order() + assert len(P) == 3 + assert all(Pi.e == Pi.f == 1 for Pi in P) + assert prod(Pi**Pi.e for Pi in P) == p*ZK + + +def test_decomp_8(): + # This time we consider various cubics, and try factoring all primes + # dividing the index. + cases = ( + x ** 3 + 3 * x ** 2 - 4 * x + 4, + x ** 3 + 3 * x ** 2 + 3 * x - 3, + x ** 3 + 5 * x ** 2 - x + 3, + x ** 3 + 5 * x ** 2 - 5 * x - 5, + x ** 3 + 3 * x ** 2 + 5, + x ** 3 + 6 * x ** 2 + 3 * x - 1, + x ** 3 + 6 * x ** 2 + 4, + x ** 3 + 7 * x ** 2 + 7 * x - 7, + x ** 3 + 7 * x ** 2 - x + 5, + x ** 3 + 7 * x ** 2 - 5 * x + 5, + x ** 3 + 4 * x ** 2 - 3 * x + 7, + x ** 3 + 8 * x ** 2 + 5 * x - 1, + x ** 3 + 8 * x ** 2 - 2 * x + 6, + x ** 3 + 6 * x ** 2 - 3 * x + 8, + x ** 3 + 9 * x ** 2 + 6 * x - 8, + x ** 3 + 15 * x ** 2 - 9 * x + 13, + ) + def display(T, p, radical, P, I, J): + """Useful for inspection, when running test manually.""" + print('=' * 20) + print(T, p, radical) + for Pi in P: + print(f' ({Pi!r})') + print("I: ", I) + print("J: ", J) + print(f'Equal: {I == J}') + inspect = False + for g in cases: + T = Poly(g) + rad = {} + ZK, dK = round_two(T, radicals=rad) + dT = T.discriminant() + f_squared = dT // dK + F = factorint(f_squared) + for p in F: + radical = rad.get(p) + P = prime_decomp(p, T, dK=dK, ZK=ZK, radical=radical) + I = prod(Pi**Pi.e for Pi in P) + J = p * ZK + if inspect: + display(T, p, radical, P, I, J) + assert I == J + + +def test_PrimeIdeal_eq(): + # `==` should fail on objects of different types, so even a completely + # inert PrimeIdeal should test unequal to the rational prime it divides. + T = Poly(cyclotomic_poly(7)) + P0 = prime_decomp(5, T)[0] + assert P0.f == 6 + assert P0.as_submodule() == 5 * P0.ZK + assert P0 != 5 + + +def test_PrimeIdeal_add(): + T = Poly(cyclotomic_poly(7)) + P0 = prime_decomp(7, T)[0] + # Adding ideals computes their GCD, so adding the ramified prime dividing + # 7 to 7 itself should reproduce this prime (as a submodule). + assert P0 + 7 * P0.ZK == P0.as_submodule() + + +def test_str(): + # Without alias: + k = QQ.alg_field_from_poly(Poly(x**2 + 7)) + frp = k.primes_above(2)[0] + assert str(frp) == '(2, 3*_x/2 + 1/2)' + + frp = k.primes_above(3)[0] + assert str(frp) == '(3)' + + # With alias: + k = QQ.alg_field_from_poly(Poly(x ** 2 + 7), alias='alpha') + frp = k.primes_above(2)[0] + assert str(frp) == '(2, 3*alpha/2 + 1/2)' + + frp = k.primes_above(3)[0] + assert str(frp) == '(3)' + + +def test_repr(): + T = Poly(x**2 + 7) + ZK, dK = round_two(T) + P = prime_decomp(2, T, dK=dK, ZK=ZK) + assert repr(P[0]) == '[ (2, (3*x + 1)/2) e=1, f=1 ]' + assert P[0].repr(field_gen=theta) == '[ (2, (3*theta + 1)/2) e=1, f=1 ]' + assert P[0].repr(field_gen=theta, just_gens=True) == '(2, (3*theta + 1)/2)' + + +def test_PrimeIdeal_reduce(): + k = QQ.alg_field_from_poly(Poly(x ** 3 + x ** 2 - 2 * x + 8)) + Zk = k.maximal_order() + P = k.primes_above(2) + frp = P[2] + + # reduce_element + a = Zk.parent(to_col([23, 20, 11]), denom=6) + a_bar_expected = Zk.parent(to_col([11, 5, 2]), denom=6) + a_bar = frp.reduce_element(a) + assert a_bar == a_bar_expected + + # reduce_ANP + a = k([QQ(11, 6), QQ(20, 6), QQ(23, 6)]) + a_bar_expected = k([QQ(2, 6), QQ(5, 6), QQ(11, 6)]) + a_bar = frp.reduce_ANP(a) + assert a_bar == a_bar_expected + + # reduce_alg_num + a = k.to_alg_num(a) + a_bar_expected = k.to_alg_num(a_bar_expected) + a_bar = frp.reduce_alg_num(a) + assert a_bar == a_bar_expected + + +def test_issue_23402(): + k = QQ.alg_field_from_poly(Poly(x ** 3 + x ** 2 - 2 * x + 8)) + P = k.primes_above(3) + assert P[0].alpha.equiv(0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_subfield.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_subfield.py new file mode 100644 index 0000000000000000000000000000000000000000..b152dd684aa20034f9233eedb1866aac2639b5f9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_subfield.py @@ -0,0 +1,317 @@ +"""Tests for the subfield problem and allied problems. """ + +from sympy.core.numbers import (AlgebraicNumber, I, pi, Rational) +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.external.gmpy import MPQ +from sympy.polys.numberfields.subfield import ( + is_isomorphism_possible, + field_isomorphism_pslq, + field_isomorphism, + primitive_element, + to_number_field, +) +from sympy.polys.domains import QQ +from sympy.polys.polyerrors import IsomorphismFailed +from sympy.polys.polytools import Poly +from sympy.polys.rootoftools import CRootOf +from sympy.testing.pytest import raises + +from sympy.abc import x + +Q = Rational + + +def test_field_isomorphism_pslq(): + a = AlgebraicNumber(I) + b = AlgebraicNumber(I*sqrt(3)) + + raises(NotImplementedError, lambda: field_isomorphism_pslq(a, b)) + + a = AlgebraicNumber(sqrt(2)) + b = AlgebraicNumber(sqrt(3)) + c = AlgebraicNumber(sqrt(7)) + d = AlgebraicNumber(sqrt(2) + sqrt(3)) + e = AlgebraicNumber(sqrt(2) + sqrt(3) + sqrt(7)) + + assert field_isomorphism_pslq(a, a) == [1, 0] + assert field_isomorphism_pslq(a, b) is None + assert field_isomorphism_pslq(a, c) is None + assert field_isomorphism_pslq(a, d) == [Q(1, 2), 0, -Q(9, 2), 0] + assert field_isomorphism_pslq( + a, e) == [Q(1, 80), 0, -Q(1, 2), 0, Q(59, 20), 0] + + assert field_isomorphism_pslq(b, a) is None + assert field_isomorphism_pslq(b, b) == [1, 0] + assert field_isomorphism_pslq(b, c) is None + assert field_isomorphism_pslq(b, d) == [-Q(1, 2), 0, Q(11, 2), 0] + assert field_isomorphism_pslq(b, e) == [-Q( + 3, 640), 0, Q(67, 320), 0, -Q(297, 160), 0, Q(313, 80), 0] + + assert field_isomorphism_pslq(c, a) is None + assert field_isomorphism_pslq(c, b) is None + assert field_isomorphism_pslq(c, c) == [1, 0] + assert field_isomorphism_pslq(c, d) is None + assert field_isomorphism_pslq(c, e) == [Q( + 3, 640), 0, -Q(71, 320), 0, Q(377, 160), 0, -Q(469, 80), 0] + + assert field_isomorphism_pslq(d, a) is None + assert field_isomorphism_pslq(d, b) is None + assert field_isomorphism_pslq(d, c) is None + assert field_isomorphism_pslq(d, d) == [1, 0] + assert field_isomorphism_pslq(d, e) == [-Q( + 3, 640), 0, Q(71, 320), 0, -Q(377, 160), 0, Q(549, 80), 0] + + assert field_isomorphism_pslq(e, a) is None + assert field_isomorphism_pslq(e, b) is None + assert field_isomorphism_pslq(e, c) is None + assert field_isomorphism_pslq(e, d) is None + assert field_isomorphism_pslq(e, e) == [1, 0] + + f = AlgebraicNumber(3*sqrt(2) + 8*sqrt(7) - 5) + + assert field_isomorphism_pslq( + f, e) == [Q(3, 80), 0, -Q(139, 80), 0, Q(347, 20), 0, -Q(761, 20), -5] + + +def test_field_isomorphism(): + assert field_isomorphism(3, sqrt(2)) == [3] + + assert field_isomorphism( I*sqrt(3), I*sqrt(3)/2) == [ 2, 0] + assert field_isomorphism(-I*sqrt(3), I*sqrt(3)/2) == [-2, 0] + + assert field_isomorphism( I*sqrt(3), -I*sqrt(3)/2) == [-2, 0] + assert field_isomorphism(-I*sqrt(3), -I*sqrt(3)/2) == [ 2, 0] + + assert field_isomorphism( 2*I*sqrt(3)/7, 5*I*sqrt(3)/3) == [ Rational(6, 35), 0] + assert field_isomorphism(-2*I*sqrt(3)/7, 5*I*sqrt(3)/3) == [Rational(-6, 35), 0] + + assert field_isomorphism( 2*I*sqrt(3)/7, -5*I*sqrt(3)/3) == [Rational(-6, 35), 0] + assert field_isomorphism(-2*I*sqrt(3)/7, -5*I*sqrt(3)/3) == [ Rational(6, 35), 0] + + assert field_isomorphism( + 2*I*sqrt(3)/7 + 27, 5*I*sqrt(3)/3) == [ Rational(6, 35), 27] + assert field_isomorphism( + -2*I*sqrt(3)/7 + 27, 5*I*sqrt(3)/3) == [Rational(-6, 35), 27] + + assert field_isomorphism( + 2*I*sqrt(3)/7 + 27, -5*I*sqrt(3)/3) == [Rational(-6, 35), 27] + assert field_isomorphism( + -2*I*sqrt(3)/7 + 27, -5*I*sqrt(3)/3) == [ Rational(6, 35), 27] + + p = AlgebraicNumber( sqrt(2) + sqrt(3)) + q = AlgebraicNumber(-sqrt(2) + sqrt(3)) + r = AlgebraicNumber( sqrt(2) - sqrt(3)) + s = AlgebraicNumber(-sqrt(2) - sqrt(3)) + + pos_coeffs = [ S.Half, S.Zero, Rational(-9, 2), S.Zero] + neg_coeffs = [Rational(-1, 2), S.Zero, Rational(9, 2), S.Zero] + + a = AlgebraicNumber(sqrt(2)) + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == pos_coeffs + assert field_isomorphism(a, q, fast=True) == neg_coeffs + assert field_isomorphism(a, r, fast=True) == pos_coeffs + assert field_isomorphism(a, s, fast=True) == neg_coeffs + + assert field_isomorphism(a, p, fast=False) == pos_coeffs + assert field_isomorphism(a, q, fast=False) == neg_coeffs + assert field_isomorphism(a, r, fast=False) == pos_coeffs + assert field_isomorphism(a, s, fast=False) == neg_coeffs + + a = AlgebraicNumber(-sqrt(2)) + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == neg_coeffs + assert field_isomorphism(a, q, fast=True) == pos_coeffs + assert field_isomorphism(a, r, fast=True) == neg_coeffs + assert field_isomorphism(a, s, fast=True) == pos_coeffs + + assert field_isomorphism(a, p, fast=False) == neg_coeffs + assert field_isomorphism(a, q, fast=False) == pos_coeffs + assert field_isomorphism(a, r, fast=False) == neg_coeffs + assert field_isomorphism(a, s, fast=False) == pos_coeffs + + pos_coeffs = [ S.Half, S.Zero, Rational(-11, 2), S.Zero] + neg_coeffs = [Rational(-1, 2), S.Zero, Rational(11, 2), S.Zero] + + a = AlgebraicNumber(sqrt(3)) + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == neg_coeffs + assert field_isomorphism(a, q, fast=True) == neg_coeffs + assert field_isomorphism(a, r, fast=True) == pos_coeffs + assert field_isomorphism(a, s, fast=True) == pos_coeffs + + assert field_isomorphism(a, p, fast=False) == neg_coeffs + assert field_isomorphism(a, q, fast=False) == neg_coeffs + assert field_isomorphism(a, r, fast=False) == pos_coeffs + assert field_isomorphism(a, s, fast=False) == pos_coeffs + + a = AlgebraicNumber(-sqrt(3)) + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == pos_coeffs + assert field_isomorphism(a, q, fast=True) == pos_coeffs + assert field_isomorphism(a, r, fast=True) == neg_coeffs + assert field_isomorphism(a, s, fast=True) == neg_coeffs + + assert field_isomorphism(a, p, fast=False) == pos_coeffs + assert field_isomorphism(a, q, fast=False) == pos_coeffs + assert field_isomorphism(a, r, fast=False) == neg_coeffs + assert field_isomorphism(a, s, fast=False) == neg_coeffs + + pos_coeffs = [ Rational(3, 2), S.Zero, Rational(-33, 2), -S(8)] + neg_coeffs = [Rational(-3, 2), S.Zero, Rational(33, 2), -S(8)] + + a = AlgebraicNumber(3*sqrt(3) - 8) + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == neg_coeffs + assert field_isomorphism(a, q, fast=True) == neg_coeffs + assert field_isomorphism(a, r, fast=True) == pos_coeffs + assert field_isomorphism(a, s, fast=True) == pos_coeffs + + assert field_isomorphism(a, p, fast=False) == neg_coeffs + assert field_isomorphism(a, q, fast=False) == neg_coeffs + assert field_isomorphism(a, r, fast=False) == pos_coeffs + assert field_isomorphism(a, s, fast=False) == pos_coeffs + + a = AlgebraicNumber(3*sqrt(2) + 2*sqrt(3) + 1) + + pos_1_coeffs = [ S.Half, S.Zero, Rational(-5, 2), S.One] + neg_5_coeffs = [Rational(-5, 2), S.Zero, Rational(49, 2), S.One] + pos_5_coeffs = [ Rational(5, 2), S.Zero, Rational(-49, 2), S.One] + neg_1_coeffs = [Rational(-1, 2), S.Zero, Rational(5, 2), S.One] + + assert is_isomorphism_possible(a, p) is True + assert is_isomorphism_possible(a, q) is True + assert is_isomorphism_possible(a, r) is True + assert is_isomorphism_possible(a, s) is True + + assert field_isomorphism(a, p, fast=True) == pos_1_coeffs + assert field_isomorphism(a, q, fast=True) == neg_5_coeffs + assert field_isomorphism(a, r, fast=True) == pos_5_coeffs + assert field_isomorphism(a, s, fast=True) == neg_1_coeffs + + assert field_isomorphism(a, p, fast=False) == pos_1_coeffs + assert field_isomorphism(a, q, fast=False) == neg_5_coeffs + assert field_isomorphism(a, r, fast=False) == pos_5_coeffs + assert field_isomorphism(a, s, fast=False) == neg_1_coeffs + + a = AlgebraicNumber(sqrt(2)) + b = AlgebraicNumber(sqrt(3)) + c = AlgebraicNumber(sqrt(7)) + + assert is_isomorphism_possible(a, b) is True + assert is_isomorphism_possible(b, a) is True + + assert is_isomorphism_possible(c, p) is False + + assert field_isomorphism(sqrt(2), sqrt(3), fast=True) is None + assert field_isomorphism(sqrt(3), sqrt(2), fast=True) is None + + assert field_isomorphism(sqrt(2), sqrt(3), fast=False) is None + assert field_isomorphism(sqrt(3), sqrt(2), fast=False) is None + + a = AlgebraicNumber(sqrt(2)) + b = AlgebraicNumber(2 ** (S(1) / 3)) + + assert is_isomorphism_possible(a, b) is False + assert field_isomorphism(a, b) is None + + +def test_primitive_element(): + assert primitive_element([sqrt(2)], x) == (x**2 - 2, [1]) + assert primitive_element( + [sqrt(2), sqrt(3)], x) == (x**4 - 10*x**2 + 1, [1, 1]) + + assert primitive_element([sqrt(2)], x, polys=True) == (Poly(x**2 - 2, domain='QQ'), [1]) + assert primitive_element([sqrt( + 2), sqrt(3)], x, polys=True) == (Poly(x**4 - 10*x**2 + 1, domain='QQ'), [1, 1]) + + assert primitive_element( + [sqrt(2)], x, ex=True) == (x**2 - 2, [1], [[1, 0]]) + assert primitive_element([sqrt(2), sqrt(3)], x, ex=True) == \ + (x**4 - 10*x**2 + 1, [1, 1], [[Q(1, 2), 0, -Q(9, 2), 0], [- + Q(1, 2), 0, Q(11, 2), 0]]) + + assert primitive_element( + [sqrt(2)], x, ex=True, polys=True) == (Poly(x**2 - 2, domain='QQ'), [1], [[1, 0]]) + assert primitive_element([sqrt(2), sqrt(3)], x, ex=True, polys=True) == \ + (Poly(x**4 - 10*x**2 + 1, domain='QQ'), [1, 1], [[Q(1, 2), 0, -Q(9, 2), + 0], [-Q(1, 2), 0, Q(11, 2), 0]]) + + assert primitive_element([sqrt(2)], polys=True) == (Poly(x**2 - 2), [1]) + + raises(ValueError, lambda: primitive_element([], x, ex=False)) + raises(ValueError, lambda: primitive_element([], x, ex=True)) + + # Issue 14117 + a, b = I*sqrt(2*sqrt(2) + 3), I*sqrt(-2*sqrt(2) + 3) + assert primitive_element([a, b, I], x) == (x**4 + 6*x**2 + 1, [1, 0, 0]) + + assert primitive_element([sqrt(2), 0], x) == (x**2 - 2, [1, 0]) + assert primitive_element([0, sqrt(2)], x) == (x**2 - 2, [1, 1]) + assert primitive_element([sqrt(2), 0], x, ex=True) == (x**2 - 2, [1, 0], [[MPQ(1,1), MPQ(0,1)], []]) + assert primitive_element([0, sqrt(2)], x, ex=True) == (x**2 - 2, [1, 1], [[], [MPQ(1,1), MPQ(0,1)]]) + + +def test_to_number_field(): + assert to_number_field(sqrt(2)) == AlgebraicNumber(sqrt(2)) + assert to_number_field( + [sqrt(2), sqrt(3)]) == AlgebraicNumber(sqrt(2) + sqrt(3)) + + a = AlgebraicNumber(sqrt(2) + sqrt(3), [S.Half, S.Zero, Rational(-9, 2), S.Zero]) + + assert to_number_field(sqrt(2), sqrt(2) + sqrt(3)) == a + assert to_number_field(sqrt(2), AlgebraicNumber(sqrt(2) + sqrt(3))) == a + + raises(IsomorphismFailed, lambda: to_number_field(sqrt(2), sqrt(3))) + + +def test_issue_22561(): + a = to_number_field(sqrt(2), sqrt(2) + sqrt(3)) + b = to_number_field(sqrt(2), sqrt(2) + sqrt(5)) + assert field_isomorphism(a, b) == [1, 0] + + +def test_issue_22736(): + a = CRootOf(x**4 + x**3 + x**2 + x + 1, -1) + a._reset() + b = exp(2*I*pi/5) + assert field_isomorphism(a, b) == [1, 0] + + +def test_issue_27798(): + # https://github.com/sympy/sympy/issues/27798 + a, b = CRootOf(49*x**3 - 49*x**2 + 14*x - 1, 2), CRootOf(49*x**3 - 49*x**2 + 14*x - 1, 0) + assert primitive_element([a, b], polys=True)[0].primitive()[0] == 1 + assert primitive_element([a, b], polys=True, ex=True)[0].primitive()[0] == 1 + + f1, f2 = QQ.algebraic_field(a), QQ.algebraic_field(b) + f3 = f1.unify(f2) + assert f3.mod.primitive()[0] == 1 + assert Poly(x, x, domain=f1) + Poly(x, x, domain=f2) == Poly(2*x, x, domain=f3) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_utilities.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_utilities.py new file mode 100644 index 0000000000000000000000000000000000000000..134853ef0c88045ef9cc7e215bb98db37041e63a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/tests/test_utilities.py @@ -0,0 +1,113 @@ +from sympy.abc import x +from sympy.core.numbers import (I, Rational) +from sympy.core.singleton import S +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys import Poly, cyclotomic_poly +from sympy.polys.domains import FF, QQ +from sympy.polys.matrices import DomainMatrix, DM +from sympy.polys.matrices.exceptions import DMRankError +from sympy.polys.numberfields.utilities import ( + AlgIntPowers, coeff_search, extract_fundamental_discriminant, + isolate, supplement_a_subspace, +) +from sympy.printing.lambdarepr import IntervalPrinter +from sympy.testing.pytest import raises + + +def test_AlgIntPowers_01(): + T = Poly(cyclotomic_poly(5)) + zeta_pow = AlgIntPowers(T) + raises(ValueError, lambda: zeta_pow[-1]) + for e in range(10): + a = e % 5 + if a < 4: + c = zeta_pow[e] + assert c[a] == 1 and all(c[i] == 0 for i in range(4) if i != a) + else: + assert zeta_pow[e] == [-1] * 4 + + +def test_AlgIntPowers_02(): + T = Poly(x**3 + 2*x**2 + 3*x + 4) + m = 7 + theta_pow = AlgIntPowers(T, m) + for e in range(10): + computed = theta_pow[e] + coeffs = (Poly(x)**e % T + Poly(x**3)).rep.to_list()[1:] + expected = [c % m for c in reversed(coeffs)] + assert computed == expected + + +def test_coeff_search(): + C = [] + search = coeff_search(2, 1) + for i, c in enumerate(search): + C.append(c) + if i == 12: + break + assert C == [[1, 1], [1, 0], [1, -1], [0, 1], [2, 2], [2, 1], [2, 0], [2, -1], [2, -2], [1, 2], [1, -2], [0, 2], [3, 3]] + + +def test_extract_fundamental_discriminant(): + # To extract, integer must be 0 or 1 mod 4. + raises(ValueError, lambda: extract_fundamental_discriminant(2)) + raises(ValueError, lambda: extract_fundamental_discriminant(3)) + # Try many cases, of different forms: + cases = ( + (0, {}, {0: 1}), + (1, {}, {}), + (8, {2: 3}, {}), + (-8, {2: 3, -1: 1}, {}), + (12, {2: 2, 3: 1}, {}), + (36, {}, {2: 1, 3: 1}), + (45, {5: 1}, {3: 1}), + (48, {2: 2, 3: 1}, {2: 1}), + (1125, {5: 1}, {3: 1, 5: 1}), + ) + for a, D_expected, F_expected in cases: + D, F = extract_fundamental_discriminant(a) + assert D == D_expected + assert F == F_expected + + +def test_supplement_a_subspace_1(): + M = DM([[1, 7, 0], [2, 3, 4]], QQ).transpose() + + # First supplement over QQ: + B = supplement_a_subspace(M) + assert B[:, :2] == M + assert B[:, 2] == DomainMatrix.eye(3, QQ).to_dense()[:, 0] + + # Now supplement over FF(7): + M = M.convert_to(FF(7)) + B = supplement_a_subspace(M) + assert B[:, :2] == M + # When we work mod 7, first col of M goes to [1, 0, 0], + # so the supplementary vector cannot equal this, as it did + # when we worked over QQ. Instead, we get the second std basis vector: + assert B[:, 2] == DomainMatrix.eye(3, FF(7)).to_dense()[:, 1] + + +def test_supplement_a_subspace_2(): + M = DM([[1, 0, 0], [2, 0, 0]], QQ).transpose() + with raises(DMRankError): + supplement_a_subspace(M) + + +def test_IntervalPrinter(): + ip = IntervalPrinter() + assert ip.doprint(x**Rational(1, 3)) == "x**(mpi('1/3'))" + assert ip.doprint(sqrt(x)) == "x**(mpi('1/2'))" + + +def test_isolate(): + assert isolate(1) == (1, 1) + assert isolate(S.Half) == (S.Half, S.Half) + + assert isolate(sqrt(2)) == (1, 2) + assert isolate(-sqrt(2)) == (-2, -1) + + assert isolate(sqrt(2), eps=Rational(1, 100)) == (Rational(24, 17), Rational(17, 12)) + assert isolate(-sqrt(2), eps=Rational(1, 100)) == (Rational(-17, 12), Rational(-24, 17)) + + raises(NotImplementedError, lambda: isolate(I)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/utilities.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/utilities.py new file mode 100644 index 0000000000000000000000000000000000000000..fe583efb440f02f1b16c38fb7d03621c1f97e83d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/numberfields/utilities.py @@ -0,0 +1,474 @@ +"""Utilities for algebraic number theory. """ + +from sympy.core.sympify import sympify +from sympy.ntheory.factor_ import factorint +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.domains.integerring import ZZ +from sympy.polys.matrices.exceptions import DMRankError +from sympy.polys.numberfields.minpoly import minpoly +from sympy.printing.lambdarepr import IntervalPrinter +from sympy.utilities.decorator import public +from sympy.utilities.lambdify import lambdify + +from mpmath import mp + + +def is_rat(c): + r""" + Test whether an argument is of an acceptable type to be used as a rational + number. + + Explanation + =========== + + Returns ``True`` on any argument of type ``int``, :ref:`ZZ`, or :ref:`QQ`. + + See Also + ======== + + is_int + + """ + # ``c in QQ`` is too accepting (e.g. ``3.14 in QQ`` is ``True``), + # ``QQ.of_type(c)`` is too demanding (e.g. ``QQ.of_type(3)`` is ``False``). + # + # Meanwhile, if gmpy2 is installed then ``ZZ.of_type()`` accepts only + # ``mpz``, not ``int``, so we need another clause to ensure ``int`` is + # accepted. + return isinstance(c, int) or ZZ.of_type(c) or QQ.of_type(c) + + +def is_int(c): + r""" + Test whether an argument is of an acceptable type to be used as an integer. + + Explanation + =========== + + Returns ``True`` on any argument of type ``int`` or :ref:`ZZ`. + + See Also + ======== + + is_rat + + """ + # If gmpy2 is installed then ``ZZ.of_type()`` accepts only + # ``mpz``, not ``int``, so we need another clause to ensure ``int`` is + # accepted. + return isinstance(c, int) or ZZ.of_type(c) + + +def get_num_denom(c): + r""" + Given any argument on which :py:func:`~.is_rat` is ``True``, return the + numerator and denominator of this number. + + See Also + ======== + + is_rat + + """ + r = QQ(c) + return r.numerator, r.denominator + + +@public +def extract_fundamental_discriminant(a): + r""" + Extract a fundamental discriminant from an integer *a*. + + Explanation + =========== + + Given any rational integer *a* that is 0 or 1 mod 4, write $a = d f^2$, + where $d$ is either 1 or a fundamental discriminant, and return a pair + of dictionaries ``(D, F)`` giving the prime factorizations of $d$ and $f$ + respectively, in the same format returned by :py:func:`~.factorint`. + + A fundamental discriminant $d$ is different from unity, and is either + 1 mod 4 and squarefree, or is 0 mod 4 and such that $d/4$ is squarefree + and 2 or 3 mod 4. This is the same as being the discriminant of some + quadratic field. + + Examples + ======== + + >>> from sympy.polys.numberfields.utilities import extract_fundamental_discriminant + >>> print(extract_fundamental_discriminant(-432)) + ({3: 1, -1: 1}, {2: 2, 3: 1}) + + For comparison: + + >>> from sympy import factorint + >>> print(factorint(-432)) + {2: 4, 3: 3, -1: 1} + + Parameters + ========== + + a: int, must be 0 or 1 mod 4 + + Returns + ======= + + Pair ``(D, F)`` of dictionaries. + + Raises + ====== + + ValueError + If *a* is not 0 or 1 mod 4. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Prop. 5.1.3) + + """ + if a % 4 not in [0, 1]: + raise ValueError('To extract fundamental discriminant, number must be 0 or 1 mod 4.') + if a == 0: + return {}, {0: 1} + if a == 1: + return {}, {} + a_factors = factorint(a) + D = {} + F = {} + # First pass: just make d squarefree, and a/d a perfect square. + # We'll count primes (and units! i.e. -1) that are 3 mod 4 and present in d. + num_3_mod_4 = 0 + for p, e in a_factors.items(): + if e % 2 == 1: + D[p] = 1 + if p % 4 == 3: + num_3_mod_4 += 1 + if e >= 3: + F[p] = (e - 1) // 2 + else: + F[p] = e // 2 + # Second pass: if d is cong. to 2 or 3 mod 4, then we must steal away + # another factor of 4 from f**2 and give it to d. + even = 2 in D + if even or num_3_mod_4 % 2 == 1: + e2 = F[2] + assert e2 > 0 + if e2 == 1: + del F[2] + else: + F[2] = e2 - 1 + D[2] = 3 if even else 2 + return D, F + + +@public +class AlgIntPowers: + r""" + Compute the powers of an algebraic integer. + + Explanation + =========== + + Given an algebraic integer $\theta$ by its monic irreducible polynomial + ``T`` over :ref:`ZZ`, this class computes representations of arbitrarily + high powers of $\theta$, as :ref:`ZZ`-linear combinations over + $\{1, \theta, \ldots, \theta^{n-1}\}$, where $n = \deg(T)$. + + The representations are computed using the linear recurrence relations for + powers of $\theta$, derived from the polynomial ``T``. See [1], Sec. 4.2.2. + + Optionally, the representations may be reduced with respect to a modulus. + + Examples + ======== + + >>> from sympy import Poly, cyclotomic_poly + >>> from sympy.polys.numberfields.utilities import AlgIntPowers + >>> T = Poly(cyclotomic_poly(5)) + >>> zeta_pow = AlgIntPowers(T) + >>> print(zeta_pow[0]) + [1, 0, 0, 0] + >>> print(zeta_pow[1]) + [0, 1, 0, 0] + >>> print(zeta_pow[4]) # doctest: +SKIP + [-1, -1, -1, -1] + >>> print(zeta_pow[24]) # doctest: +SKIP + [-1, -1, -1, -1] + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + + """ + + def __init__(self, T, modulus=None): + """ + Parameters + ========== + + T : :py:class:`~.Poly` + The monic irreducible polynomial over :ref:`ZZ` defining the + algebraic integer. + + modulus : int, None, optional + If not ``None``, all representations will be reduced w.r.t. this. + + """ + self.T = T + self.modulus = modulus + self.n = T.degree() + self.powers_n_and_up = [[-c % self for c in reversed(T.rep.to_list())][:-1]] + self.max_so_far = self.n + + def red(self, exp): + return exp if self.modulus is None else exp % self.modulus + + def __rmod__(self, other): + return self.red(other) + + def compute_up_through(self, e): + m = self.max_so_far + if e <= m: return + n = self.n + r = self.powers_n_and_up + c = r[0] + for k in range(m+1, e+1): + b = r[k-1-n][n-1] + r.append( + [c[0]*b % self] + [ + (r[k-1-n][i-1] + c[i]*b) % self for i in range(1, n) + ] + ) + self.max_so_far = e + + def get(self, e): + n = self.n + if e < 0: + raise ValueError('Exponent must be non-negative.') + elif e < n: + return [1 if i == e else 0 for i in range(n)] + else: + self.compute_up_through(e) + return self.powers_n_and_up[e - n] + + def __getitem__(self, item): + return self.get(item) + + +@public +def coeff_search(m, R): + r""" + Generate coefficients for searching through polynomials. + + Explanation + =========== + + Lead coeff is always non-negative. Explore all combinations with coeffs + bounded in absolute value before increasing the bound. Skip the all-zero + list, and skip any repeats. See examples. + + Examples + ======== + + >>> from sympy.polys.numberfields.utilities import coeff_search + >>> cs = coeff_search(2, 1) + >>> C = [next(cs) for i in range(13)] + >>> print(C) + [[1, 1], [1, 0], [1, -1], [0, 1], [2, 2], [2, 1], [2, 0], [2, -1], [2, -2], + [1, 2], [1, -2], [0, 2], [3, 3]] + + Parameters + ========== + + m : int + Length of coeff list. + R : int + Initial max abs val for coeffs (will increase as search proceeds). + + Returns + ======= + + generator + Infinite generator of lists of coefficients. + + """ + R0 = R + c = [R] * m + while True: + if R == R0 or R in c or -R in c: + yield c[:] + j = m - 1 + while c[j] == -R: + j -= 1 + c[j] -= 1 + for i in range(j + 1, m): + c[i] = R + for j in range(m): + if c[j] != 0: + break + else: + R += 1 + c = [R] * m + + +def supplement_a_subspace(M): + r""" + Extend a basis for a subspace to a basis for the whole space. + + Explanation + =========== + + Given an $n \times r$ matrix *M* of rank $r$ (so $r \leq n$), this function + computes an invertible $n \times n$ matrix $B$ such that the first $r$ + columns of $B$ equal *M*. + + This operation can be interpreted as a way of extending a basis for a + subspace, to give a basis for the whole space. + + To be precise, suppose you have an $n$-dimensional vector space $V$, with + basis $\{v_1, v_2, \ldots, v_n\}$, and an $r$-dimensional subspace $W$ of + $V$, spanned by a basis $\{w_1, w_2, \ldots, w_r\}$, where the $w_j$ are + given as linear combinations of the $v_i$. If the columns of *M* represent + the $w_j$ as such linear combinations, then the columns of the matrix $B$ + computed by this function give a new basis $\{u_1, u_2, \ldots, u_n\}$ for + $V$, again relative to the $\{v_i\}$ basis, and such that $u_j = w_j$ + for $1 \leq j \leq r$. + + Examples + ======== + + Note: The function works in terms of columns, so in these examples we + print matrix transposes in order to make the columns easier to inspect. + + >>> from sympy.polys.matrices import DM + >>> from sympy import QQ, FF + >>> from sympy.polys.numberfields.utilities import supplement_a_subspace + >>> M = DM([[1, 7, 0], [2, 3, 4]], QQ).transpose() + >>> print(supplement_a_subspace(M).to_Matrix().transpose()) + Matrix([[1, 7, 0], [2, 3, 4], [1, 0, 0]]) + + >>> M2 = M.convert_to(FF(7)) + >>> print(M2.to_Matrix().transpose()) + Matrix([[1, 0, 0], [2, 3, -3]]) + >>> print(supplement_a_subspace(M2).to_Matrix().transpose()) + Matrix([[1, 0, 0], [2, 3, -3], [0, 1, 0]]) + + Parameters + ========== + + M : :py:class:`~.DomainMatrix` + The columns give the basis for the subspace. + + Returns + ======= + + :py:class:`~.DomainMatrix` + This matrix is invertible and its first $r$ columns equal *M*. + + Raises + ====== + + DMRankError + If *M* was not of maximal rank. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory* + (See Sec. 2.3.2.) + + """ + n, r = M.shape + # Let In be the n x n identity matrix. + # Form the augmented matrix [M | In] and compute RREF. + Maug = M.hstack(M.eye(n, M.domain)) + R, pivots = Maug.rref() + if pivots[:r] != tuple(range(r)): + raise DMRankError('M was not of maximal rank') + # Let J be the n x r matrix equal to the first r columns of In. + # Since M is of rank r, RREF reduces [M | In] to [J | A], where A is the product of + # elementary matrices Ei corresp. to the row ops performed by RREF. Since the Ei are + # invertible, so is A. Let B = A^(-1). + A = R[:, r:] + B = A.inv() + # Then B is the desired matrix. It is invertible, since B^(-1) == A. + # And A * [M | In] == [J | A] + # => A * M == J + # => M == B * J == the first r columns of B. + return B + + +@public +def isolate(alg, eps=None, fast=False): + """ + Find a rational isolating interval for a real algebraic number. + + Examples + ======== + + >>> from sympy import isolate, sqrt, Rational + >>> print(isolate(sqrt(2))) # doctest: +SKIP + (1, 2) + >>> print(isolate(sqrt(2), eps=Rational(1, 100))) + (24/17, 17/12) + + Parameters + ========== + + alg : str, int, :py:class:`~.Expr` + The algebraic number to be isolated. Must be a real number, to use this + particular function. However, see also :py:meth:`.Poly.intervals`, + which isolates complex roots when you pass ``all=True``. + eps : positive element of :ref:`QQ`, None, optional (default=None) + Precision to be passed to :py:meth:`.Poly.refine_root` + fast : boolean, optional (default=False) + Say whether fast refinement procedure should be used. + (Will be passed to :py:meth:`.Poly.refine_root`.) + + Returns + ======= + + Pair of rational numbers defining an isolating interval for the given + algebraic number. + + See Also + ======== + + .Poly.intervals + + """ + alg = sympify(alg) + + if alg.is_Rational: + return (alg, alg) + elif not alg.is_real: + raise NotImplementedError( + "complex algebraic numbers are not supported") + + func = lambdify((), alg, modules="mpmath", printer=IntervalPrinter()) + + poly = minpoly(alg, polys=True) + intervals = poly.intervals(sqf=True) + + dps, done = mp.dps, False + + try: + while not done: + alg = func() + + for a, b in intervals: + if a <= alg.a and alg.b <= b: + done = True + break + else: + mp.dps *= 2 + finally: + mp.dps = dps + + if eps is not None: + a, b = poly.refine_root(a, b, eps=eps, fast=fast) + + return (a, b) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orderings.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orderings.py new file mode 100644 index 0000000000000000000000000000000000000000..b6ed575d5103440e1e8ebda4c53c4149d3badf11 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orderings.py @@ -0,0 +1,286 @@ +"""Definitions of monomial orderings. """ + +from __future__ import annotations + +__all__ = ["lex", "grlex", "grevlex", "ilex", "igrlex", "igrevlex"] + +from sympy.core import Symbol +from sympy.utilities.iterables import iterable + +class MonomialOrder: + """Base class for monomial orderings. """ + + alias: str | None = None + is_global: bool | None = None + is_default = False + + def __repr__(self): + return self.__class__.__name__ + "()" + + def __str__(self): + return self.alias + + def __call__(self, monomial): + raise NotImplementedError + + def __eq__(self, other): + return self.__class__ == other.__class__ + + def __hash__(self): + return hash(self.__class__) + + def __ne__(self, other): + return not (self == other) + +class LexOrder(MonomialOrder): + """Lexicographic order of monomials. """ + + alias = 'lex' + is_global = True + is_default = True + + def __call__(self, monomial): + return monomial + +class GradedLexOrder(MonomialOrder): + """Graded lexicographic order of monomials. """ + + alias = 'grlex' + is_global = True + + def __call__(self, monomial): + return (sum(monomial), monomial) + +class ReversedGradedLexOrder(MonomialOrder): + """Reversed graded lexicographic order of monomials. """ + + alias = 'grevlex' + is_global = True + + def __call__(self, monomial): + return (sum(monomial), tuple(reversed([-m for m in monomial]))) + +class ProductOrder(MonomialOrder): + """ + A product order built from other monomial orders. + + Given (not necessarily total) orders O1, O2, ..., On, their product order + P is defined as M1 > M2 iff there exists i such that O1(M1) = O2(M2), + ..., Oi(M1) = Oi(M2), O{i+1}(M1) > O{i+1}(M2). + + Product orders are typically built from monomial orders on different sets + of variables. + + ProductOrder is constructed by passing a list of pairs + [(O1, L1), (O2, L2), ...] where Oi are MonomialOrders and Li are callables. + Upon comparison, the Li are passed the total monomial, and should filter + out the part of the monomial to pass to Oi. + + Examples + ======== + + We can use a lexicographic order on x_1, x_2 and also on + y_1, y_2, y_3, and their product on {x_i, y_i} as follows: + + >>> from sympy.polys.orderings import lex, grlex, ProductOrder + >>> P = ProductOrder( + ... (lex, lambda m: m[:2]), # lex order on x_1 and x_2 of monomial + ... (grlex, lambda m: m[2:]) # grlex on y_1, y_2, y_3 + ... ) + >>> P((2, 1, 1, 0, 0)) > P((1, 10, 0, 2, 0)) + True + + Here the exponent `2` of `x_1` in the first monomial + (`x_1^2 x_2 y_1`) is bigger than the exponent `1` of `x_1` in the + second monomial (`x_1 x_2^10 y_2^2`), so the first monomial is greater + in the product ordering. + + >>> P((2, 1, 1, 0, 0)) < P((2, 1, 0, 2, 0)) + True + + Here the exponents of `x_1` and `x_2` agree, so the grlex order on + `y_1, y_2, y_3` is used to decide the ordering. In this case the monomial + `y_2^2` is ordered larger than `y_1`, since for the grlex order the degree + of the monomial is most important. + """ + + def __init__(self, *args): + self.args = args + + def __call__(self, monomial): + return tuple(O(lamda(monomial)) for (O, lamda) in self.args) + + def __repr__(self): + contents = [repr(x[0]) for x in self.args] + return self.__class__.__name__ + '(' + ", ".join(contents) + ')' + + def __str__(self): + contents = [str(x[0]) for x in self.args] + return self.__class__.__name__ + '(' + ", ".join(contents) + ')' + + def __eq__(self, other): + if not isinstance(other, ProductOrder): + return False + return self.args == other.args + + def __hash__(self): + return hash((self.__class__, self.args)) + + @property + def is_global(self): + if all(o.is_global is True for o, _ in self.args): + return True + if all(o.is_global is False for o, _ in self.args): + return False + return None + +class InverseOrder(MonomialOrder): + """ + The "inverse" of another monomial order. + + If O is any monomial order, we can construct another monomial order iO + such that `A >_{iO} B` if and only if `B >_O A`. This is useful for + constructing local orders. + + Note that many algorithms only work with *global* orders. + + For example, in the inverse lexicographic order on a single variable `x`, + high powers of `x` count as small: + + >>> from sympy.polys.orderings import lex, InverseOrder + >>> ilex = InverseOrder(lex) + >>> ilex((5,)) < ilex((0,)) + True + """ + + def __init__(self, O): + self.O = O + + def __str__(self): + return "i" + str(self.O) + + def __call__(self, monomial): + def inv(l): + if iterable(l): + return tuple(inv(x) for x in l) + return -l + return inv(self.O(monomial)) + + @property + def is_global(self): + if self.O.is_global is True: + return False + if self.O.is_global is False: + return True + return None + + def __eq__(self, other): + return isinstance(other, InverseOrder) and other.O == self.O + + def __hash__(self): + return hash((self.__class__, self.O)) + +lex = LexOrder() +grlex = GradedLexOrder() +grevlex = ReversedGradedLexOrder() +ilex = InverseOrder(lex) +igrlex = InverseOrder(grlex) +igrevlex = InverseOrder(grevlex) + +_monomial_key = { + 'lex': lex, + 'grlex': grlex, + 'grevlex': grevlex, + 'ilex': ilex, + 'igrlex': igrlex, + 'igrevlex': igrevlex +} + +def monomial_key(order=None, gens=None): + """ + Return a function defining admissible order on monomials. + + The result of a call to :func:`monomial_key` is a function which should + be used as a key to :func:`sorted` built-in function, to provide order + in a set of monomials of the same length. + + Currently supported monomial orderings are: + + 1. lex - lexicographic order (default) + 2. grlex - graded lexicographic order + 3. grevlex - reversed graded lexicographic order + 4. ilex, igrlex, igrevlex - the corresponding inverse orders + + If the ``order`` input argument is not a string but has ``__call__`` + attribute, then it will pass through with an assumption that the + callable object defines an admissible order on monomials. + + If the ``gens`` input argument contains a list of generators, the + resulting key function can be used to sort SymPy ``Expr`` objects. + + """ + if order is None: + order = lex + + if isinstance(order, Symbol): + order = str(order) + + if isinstance(order, str): + try: + order = _monomial_key[order] + except KeyError: + raise ValueError("supported monomial orderings are 'lex', 'grlex' and 'grevlex', got %r" % order) + if hasattr(order, '__call__'): + if gens is not None: + def _order(expr): + return order(expr.as_poly(*gens).degree_list()) + return _order + return order + else: + raise ValueError("monomial ordering specification must be a string or a callable, got %s" % order) + +class _ItemGetter: + """Helper class to return a subsequence of values.""" + + def __init__(self, seq): + self.seq = tuple(seq) + + def __call__(self, m): + return tuple(m[idx] for idx in self.seq) + + def __eq__(self, other): + if not isinstance(other, _ItemGetter): + return False + return self.seq == other.seq + +def build_product_order(arg, gens): + """ + Build a monomial order on ``gens``. + + ``arg`` should be a tuple of iterables. The first element of each iterable + should be a string or monomial order (will be passed to monomial_key), + the others should be subsets of the generators. This function will build + the corresponding product order. + + For example, build a product of two grlex orders: + + >>> from sympy.polys.orderings import build_product_order + >>> from sympy.abc import x, y, z, t + + >>> O = build_product_order((("grlex", x, y), ("grlex", z, t)), [x, y, z, t]) + >>> O((1, 2, 3, 4)) + ((3, (1, 2)), (7, (3, 4))) + + """ + gens2idx = {} + for i, g in enumerate(gens): + gens2idx[g] = i + order = [] + for expr in arg: + name = expr[0] + var = expr[1:] + + def makelambda(var): + return _ItemGetter(gens2idx[g] for g in var) + order.append((monomial_key(name), makelambda(var))) + return ProductOrder(*order) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orthopolys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orthopolys.py new file mode 100644 index 0000000000000000000000000000000000000000..ee82457703a2be172951ee38e3cd67f221a438a0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/orthopolys.py @@ -0,0 +1,343 @@ +"""Efficient functions for generating orthogonal polynomials.""" +from sympy.core.symbol import Dummy +from sympy.polys.densearith import (dup_mul, dup_mul_ground, + dup_lshift, dup_sub, dup_add, dup_sub_term, dup_sub_ground, dup_sqr) +from sympy.polys.domains import ZZ, QQ +from sympy.polys.polytools import named_poly +from sympy.utilities import public + +def dup_jacobi(n, a, b, K): + """Low-level implementation of Jacobi polynomials.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [(a+b)/K(2) + K.one, (a-b)/K(2)] + for i in range(2, n+1): + den = K(i)*(a + b + i)*(a + b + K(2)*i - K(2)) + f0 = (a + b + K(2)*i - K.one) * (a*a - b*b) / (K(2)*den) + f1 = (a + b + K(2)*i - K.one) * (a + b + K(2)*i - K(2)) * (a + b + K(2)*i) / (K(2)*den) + f2 = (a + i - K.one)*(b + i - K.one)*(a + b + K(2)*i) / den + p0 = dup_mul_ground(m1, f0, K) + p1 = dup_mul_ground(dup_lshift(m1, 1, K), f1, K) + p2 = dup_mul_ground(m2, f2, K) + m2, m1 = m1, dup_sub(dup_add(p0, p1, K), p2, K) + return m1 + +@public +def jacobi_poly(n, a, b, x=None, polys=False): + r"""Generates the Jacobi polynomial `P_n^{(a,b)}(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + a + Lower limit of minimal domain for the list of coefficients. + b + Upper limit of minimal domain for the list of coefficients. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_jacobi, None, "Jacobi polynomial", (x, a, b), polys) + +def dup_gegenbauer(n, a, K): + """Low-level implementation of Gegenbauer polynomials.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [K(2)*a, K.zero] + for i in range(2, n+1): + p1 = dup_mul_ground(dup_lshift(m1, 1, K), K(2)*(a-K.one)/K(i) + K(2), K) + p2 = dup_mul_ground(m2, K(2)*(a-K.one)/K(i) + K.one, K) + m2, m1 = m1, dup_sub(p1, p2, K) + return m1 + +def gegenbauer_poly(n, a, x=None, polys=False): + r"""Generates the Gegenbauer polynomial `C_n^{(a)}(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + a + Decides minimal domain for the list of coefficients. + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_gegenbauer, None, "Gegenbauer polynomial", (x, a), polys) + +def dup_chebyshevt(n, K): + """Low-level implementation of Chebyshev polynomials of the first kind.""" + if n < 1: + return [K.one] + # When n is small, it is faster to directly calculate the recurrence relation. + if n < 64: # The threshold serves as a heuristic + return _dup_chebyshevt_rec(n, K) + return _dup_chebyshevt_prod(n, K) + +def _dup_chebyshevt_rec(n, K): + r""" Chebyshev polynomials of the first kind using recurrence. + + Explanation + =========== + + Chebyshev polynomials of the first kind are defined by the recurrence + relation: + + .. math:: + T_0(x) &= 1\\ + T_1(x) &= x\\ + T_n(x) &= 2xT_{n-1}(x) - T_{n-2}(x) + + This function calculates the Chebyshev polynomial of the first kind using + the above recurrence relation. + + Parameters + ========== + + n : int + n is a nonnegative integer. + K : domain + + """ + m2, m1 = [K.one], [K.one, K.zero] + for _ in range(n - 1): + m2, m1 = m1, dup_sub(dup_mul_ground(dup_lshift(m1, 1, K), K(2), K), m2, K) + return m1 + +def _dup_chebyshevt_prod(n, K): + r""" Chebyshev polynomials of the first kind using recursive products. + + Explanation + =========== + + Computes Chebyshev polynomials of the first kind using + + .. math:: + T_{2n}(x) &= 2T_n^2(x) - 1\\ + T_{2n+1}(x) &= 2T_{n+1}(x)T_n(x) - x + + This is faster than ``_dup_chebyshevt_rec`` for large ``n``. + + Parameters + ========== + + n : int + n is a nonnegative integer. + K : domain + + """ + m2, m1 = [K.one, K.zero], [K(2), K.zero, -K.one] + for i in bin(n)[3:]: + c = dup_sub_term(dup_mul_ground(dup_mul(m1, m2, K), K(2), K), K.one, 1, K) + if i == '1': + m2, m1 = c, dup_sub_ground(dup_mul_ground(dup_sqr(m1, K), K(2), K), K.one, K) + else: + m2, m1 = dup_sub_ground(dup_mul_ground(dup_sqr(m2, K), K(2), K), K.one, K), c + return m2 + +def dup_chebyshevu(n, K): + """Low-level implementation of Chebyshev polynomials of the second kind.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [K(2), K.zero] + for i in range(2, n+1): + m2, m1 = m1, dup_sub(dup_mul_ground(dup_lshift(m1, 1, K), K(2), K), m2, K) + return m1 + +@public +def chebyshevt_poly(n, x=None, polys=False): + r"""Generates the Chebyshev polynomial of the first kind `T_n(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_chebyshevt, ZZ, + "Chebyshev polynomial of the first kind", (x,), polys) + +@public +def chebyshevu_poly(n, x=None, polys=False): + r"""Generates the Chebyshev polynomial of the second kind `U_n(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_chebyshevu, ZZ, + "Chebyshev polynomial of the second kind", (x,), polys) + +def dup_hermite(n, K): + """Low-level implementation of Hermite polynomials.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [K(2), K.zero] + for i in range(2, n+1): + a = dup_lshift(m1, 1, K) + b = dup_mul_ground(m2, K(i-1), K) + m2, m1 = m1, dup_mul_ground(dup_sub(a, b, K), K(2), K) + return m1 + +def dup_hermite_prob(n, K): + """Low-level implementation of probabilist's Hermite polynomials.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [K.one, K.zero] + for i in range(2, n+1): + a = dup_lshift(m1, 1, K) + b = dup_mul_ground(m2, K(i-1), K) + m2, m1 = m1, dup_sub(a, b, K) + return m1 + +@public +def hermite_poly(n, x=None, polys=False): + r"""Generates the Hermite polynomial `H_n(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_hermite, ZZ, "Hermite polynomial", (x,), polys) + +@public +def hermite_prob_poly(n, x=None, polys=False): + r"""Generates the probabilist's Hermite polynomial `He_n(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_hermite_prob, ZZ, + "probabilist's Hermite polynomial", (x,), polys) + +def dup_legendre(n, K): + """Low-level implementation of Legendre polynomials.""" + if n < 1: + return [K.one] + m2, m1 = [K.one], [K.one, K.zero] + for i in range(2, n+1): + a = dup_mul_ground(dup_lshift(m1, 1, K), K(2*i-1, i), K) + b = dup_mul_ground(m2, K(i-1, i), K) + m2, m1 = m1, dup_sub(a, b, K) + return m1 + +@public +def legendre_poly(n, x=None, polys=False): + r"""Generates the Legendre polynomial `P_n(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_legendre, QQ, "Legendre polynomial", (x,), polys) + +def dup_laguerre(n, alpha, K): + """Low-level implementation of Laguerre polynomials.""" + m2, m1 = [K.zero], [K.one] + for i in range(1, n+1): + a = dup_mul(m1, [-K.one/K(i), (alpha-K.one)/K(i) + K(2)], K) + b = dup_mul_ground(m2, (alpha-K.one)/K(i) + K.one, K) + m2, m1 = m1, dup_sub(a, b, K) + return m1 + +@public +def laguerre_poly(n, x=None, alpha=0, polys=False): + r"""Generates the Laguerre polynomial `L_n^{(\alpha)}(x)`. + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + alpha : optional + Decides minimal domain for the list of coefficients. + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + return named_poly(n, dup_laguerre, None, "Laguerre polynomial", (x, alpha), polys) + +def dup_spherical_bessel_fn(n, K): + """Low-level implementation of fn(n, x).""" + if n < 1: + return [K.one, K.zero] + m2, m1 = [K.one], [K.one, K.zero] + for i in range(2, n+1): + m2, m1 = m1, dup_sub(dup_mul_ground(dup_lshift(m1, 1, K), K(2*i-1), K), m2, K) + return dup_lshift(m1, 1, K) + +def dup_spherical_bessel_fn_minus(n, K): + """Low-level implementation of fn(-n, x).""" + m2, m1 = [K.one, K.zero], [K.zero] + for i in range(2, n+1): + m2, m1 = m1, dup_sub(dup_mul_ground(dup_lshift(m1, 1, K), K(3-2*i), K), m2, K) + return m1 + +def spherical_bessel_fn(n, x=None, polys=False): + """ + Coefficients for the spherical Bessel functions. + + These are only needed in the jn() function. + + The coefficients are calculated from: + + fn(0, z) = 1/z + fn(1, z) = 1/z**2 + fn(n-1, z) + fn(n+1, z) == (2*n+1)/z * fn(n, z) + + Parameters + ========== + + n : int + Degree of the polynomial. + x : optional + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + + Examples + ======== + + >>> from sympy.polys.orthopolys import spherical_bessel_fn as fn + >>> from sympy import Symbol + >>> z = Symbol("z") + >>> fn(1, z) + z**(-2) + >>> fn(2, z) + -1/z + 3/z**3 + >>> fn(3, z) + -6/z**2 + 15/z**4 + >>> fn(4, z) + 1/z - 45/z**3 + 105/z**5 + + """ + if x is None: + x = Dummy("x") + f = dup_spherical_bessel_fn_minus if n < 0 else dup_spherical_bessel_fn + return named_poly(abs(n), f, ZZ, "", (QQ(1)/x,), polys) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/partfrac.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/partfrac.py new file mode 100644 index 0000000000000000000000000000000000000000..dedc1bf0fba42128e869303ed9b12c598640a36c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/partfrac.py @@ -0,0 +1,496 @@ +"""Algorithms for partial fraction decomposition of rational functions. """ + + +from sympy.core import S, Add, sympify, Function, Lambda, Dummy +from sympy.core.traversal import preorder_traversal +from sympy.polys import Poly, RootSum, cancel, factor +from sympy.polys.polyerrors import PolynomialError +from sympy.polys.polyoptions import allowed_flags, set_defaults +from sympy.polys.polytools import parallel_poly_from_expr +from sympy.utilities import numbered_symbols, take, xthreaded, public + + +@xthreaded +@public +def apart(f, x=None, full=False, **options): + """ + Compute partial fraction decomposition of a rational function. + + Given a rational function ``f``, computes the partial fraction + decomposition of ``f``. Two algorithms are available: One is based on the + undetermined coefficients method, the other is Bronstein's full partial + fraction decomposition algorithm. + + The undetermined coefficients method (selected by ``full=False``) uses + polynomial factorization (and therefore accepts the same options as + factor) for the denominator. Per default it works over the rational + numbers, therefore decomposition of denominators with non-rational roots + (e.g. irrational, complex roots) is not supported by default (see options + of factor). + + Bronstein's algorithm can be selected by using ``full=True`` and allows a + decomposition of denominators with non-rational roots. A human-readable + result can be obtained via ``doit()`` (see examples below). + + Examples + ======== + + >>> from sympy.polys.partfrac import apart + >>> from sympy.abc import x, y + + By default, using the undetermined coefficients method: + + >>> apart(y/(x + 2)/(x + 1), x) + -y/(x + 2) + y/(x + 1) + + The undetermined coefficients method does not provide a result when the + denominators roots are not rational: + + >>> apart(y/(x**2 + x + 1), x) + y/(x**2 + x + 1) + + You can choose Bronstein's algorithm by setting ``full=True``: + + >>> apart(y/(x**2 + x + 1), x, full=True) + RootSum(_w**2 + _w + 1, Lambda(_a, (-2*_a*y/3 - y/3)/(-_a + x))) + + Calling ``doit()`` yields a human-readable result: + + >>> apart(y/(x**2 + x + 1), x, full=True).doit() + (-y/3 - 2*y*(-1/2 - sqrt(3)*I/2)/3)/(x + 1/2 + sqrt(3)*I/2) + (-y/3 - + 2*y*(-1/2 + sqrt(3)*I/2)/3)/(x + 1/2 - sqrt(3)*I/2) + + + See Also + ======== + + apart_list, assemble_partfrac_list + """ + allowed_flags(options, []) + + f = sympify(f) + + if f.is_Atom: + return f + else: + P, Q = f.as_numer_denom() + + _options = options.copy() + options = set_defaults(options, extension=True) + try: + (P, Q), opt = parallel_poly_from_expr((P, Q), x, **options) + except PolynomialError as msg: + if f.is_commutative: + raise PolynomialError(msg) + # non-commutative + if f.is_Mul: + c, nc = f.args_cnc(split_1=False) + nc = f.func(*nc) + if c: + c = apart(f.func._from_args(c), x=x, full=full, **_options) + return c*nc + else: + return nc + elif f.is_Add: + c = [] + nc = [] + for i in f.args: + if i.is_commutative: + c.append(i) + else: + try: + nc.append(apart(i, x=x, full=full, **_options)) + except NotImplementedError: + nc.append(i) + return apart(f.func(*c), x=x, full=full, **_options) + f.func(*nc) + else: + reps = [] + pot = preorder_traversal(f) + next(pot) + for e in pot: + try: + reps.append((e, apart(e, x=x, full=full, **_options))) + pot.skip() # this was handled successfully + except NotImplementedError: + pass + return f.xreplace(dict(reps)) + + if P.is_multivariate: + fc = f.cancel() + if fc != f: + return apart(fc, x=x, full=full, **_options) + + raise NotImplementedError( + "multivariate partial fraction decomposition") + + common, P, Q = P.cancel(Q) + + poly, P = P.div(Q, auto=True) + P, Q = P.rat_clear_denoms(Q) + + if Q.degree() <= 1: + partial = P/Q + else: + if not full: + partial = apart_undetermined_coeffs(P, Q) + else: + partial = apart_full_decomposition(P, Q) + + terms = S.Zero + + for term in Add.make_args(partial): + if term.has(RootSum): + terms += term + else: + terms += factor(term) + + return common*(poly.as_expr() + terms) + + +def apart_undetermined_coeffs(P, Q): + """Partial fractions via method of undetermined coefficients. """ + X = numbered_symbols(cls=Dummy) + partial, symbols = [], [] + + _, factors = Q.factor_list() + + for f, k in factors: + n, q = f.degree(), Q + + for i in range(1, k + 1): + coeffs, q = take(X, n), q.quo(f) + partial.append((coeffs, q, f, i)) + symbols.extend(coeffs) + + dom = Q.get_domain().inject(*symbols) + F = Poly(0, Q.gen, domain=dom) + + for i, (coeffs, q, f, k) in enumerate(partial): + h = Poly(coeffs, Q.gen, domain=dom) + partial[i] = (h, f, k) + q = q.set_domain(dom) + F += h*q + + system, result = [], S.Zero + + for (k,), coeff in F.terms(): + system.append(coeff - P.nth(k)) + + from sympy.solvers import solve + solution = solve(system, symbols) + + for h, f, k in partial: + h = h.as_expr().subs(solution) + result += h/f.as_expr()**k + + return result + + +def apart_full_decomposition(P, Q): + """ + Bronstein's full partial fraction decomposition algorithm. + + Given a univariate rational function ``f``, performing only GCD + operations over the algebraic closure of the initial ground domain + of definition, compute full partial fraction decomposition with + fractions having linear denominators. + + Note that no factorization of the initial denominator of ``f`` is + performed. The final decomposition is formed in terms of a sum of + :class:`RootSum` instances. + + References + ========== + + .. [1] [Bronstein93]_ + + """ + return assemble_partfrac_list(apart_list(P/Q, P.gens[0])) + + +@public +def apart_list(f, x=None, dummies=None, **options): + """ + Compute partial fraction decomposition of a rational function + and return the result in structured form. + + Given a rational function ``f`` compute the partial fraction decomposition + of ``f``. Only Bronstein's full partial fraction decomposition algorithm + is supported by this method. The return value is highly structured and + perfectly suited for further algorithmic treatment rather than being + human-readable. The function returns a tuple holding three elements: + + * The first item is the common coefficient, free of the variable `x` used + for decomposition. (It is an element of the base field `K`.) + + * The second item is the polynomial part of the decomposition. This can be + the zero polynomial. (It is an element of `K[x]`.) + + * The third part itself is a list of quadruples. Each quadruple + has the following elements in this order: + + - The (not necessarily irreducible) polynomial `D` whose roots `w_i` appear + in the linear denominator of a bunch of related fraction terms. (This item + can also be a list of explicit roots. However, at the moment ``apart_list`` + never returns a result this way, but the related ``assemble_partfrac_list`` + function accepts this format as input.) + + - The numerator of the fraction, written as a function of the root `w` + + - The linear denominator of the fraction *excluding its power exponent*, + written as a function of the root `w`. + + - The power to which the denominator has to be raised. + + On can always rebuild a plain expression by using the function ``assemble_partfrac_list``. + + Examples + ======== + + A first example: + + >>> from sympy.polys.partfrac import apart_list, assemble_partfrac_list + >>> from sympy.abc import x, t + + >>> f = (2*x**3 - 2*x) / (x**2 - 2*x + 1) + >>> pfd = apart_list(f) + >>> pfd + (1, + Poly(2*x + 4, x, domain='ZZ'), + [(Poly(_w - 1, _w, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1)]) + + >>> assemble_partfrac_list(pfd) + 2*x + 4 + 4/(x - 1) + + Second example: + + >>> f = (-2*x - 2*x**2) / (3*x**2 - 6*x) + >>> pfd = apart_list(f) + >>> pfd + (-1, + Poly(2/3, x, domain='QQ'), + [(Poly(_w - 2, _w, domain='ZZ'), Lambda(_a, 2), Lambda(_a, -_a + x), 1)]) + + >>> assemble_partfrac_list(pfd) + -2/3 - 2/(x - 2) + + Another example, showing symbolic parameters: + + >>> pfd = apart_list(t/(x**2 + x + t), x) + >>> pfd + (1, + Poly(0, x, domain='ZZ[t]'), + [(Poly(_w**2 + _w + t, _w, domain='ZZ[t]'), + Lambda(_a, -2*_a*t/(4*t - 1) - t/(4*t - 1)), + Lambda(_a, -_a + x), + 1)]) + + >>> assemble_partfrac_list(pfd) + RootSum(_w**2 + _w + t, Lambda(_a, (-2*_a*t/(4*t - 1) - t/(4*t - 1))/(-_a + x))) + + This example is taken from Bronstein's original paper: + + >>> f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) + >>> pfd = apart_list(f) + >>> pfd + (1, + Poly(0, x, domain='ZZ'), + [(Poly(_w - 2, _w, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1), + (Poly(_w**2 - 1, _w, domain='ZZ'), Lambda(_a, -3*_a - 6), Lambda(_a, -_a + x), 2), + (Poly(_w + 1, _w, domain='ZZ'), Lambda(_a, -4), Lambda(_a, -_a + x), 1)]) + + >>> assemble_partfrac_list(pfd) + -4/(x + 1) - 3/(x + 1)**2 - 9/(x - 1)**2 + 4/(x - 2) + + See also + ======== + + apart, assemble_partfrac_list + + References + ========== + + .. [1] [Bronstein93]_ + + """ + allowed_flags(options, []) + + f = sympify(f) + + if f.is_Atom: + return f + else: + P, Q = f.as_numer_denom() + + options = set_defaults(options, extension=True) + (P, Q), opt = parallel_poly_from_expr((P, Q), x, **options) + + if P.is_multivariate: + raise NotImplementedError( + "multivariate partial fraction decomposition") + + common, P, Q = P.cancel(Q) + + poly, P = P.div(Q, auto=True) + P, Q = P.rat_clear_denoms(Q) + + polypart = poly + + if dummies is None: + def dummies(name): + d = Dummy(name) + while True: + yield d + + dummies = dummies("w") + + rationalpart = apart_list_full_decomposition(P, Q, dummies) + + return (common, polypart, rationalpart) + + +def apart_list_full_decomposition(P, Q, dummygen): + """ + Bronstein's full partial fraction decomposition algorithm. + + Given a univariate rational function ``f``, performing only GCD + operations over the algebraic closure of the initial ground domain + of definition, compute full partial fraction decomposition with + fractions having linear denominators. + + Note that no factorization of the initial denominator of ``f`` is + performed. The final decomposition is formed in terms of a sum of + :class:`RootSum` instances. + + References + ========== + + .. [1] [Bronstein93]_ + + """ + P_orig, Q_orig, x, U = P, Q, P.gen, [] + + u = Function('u')(x) + a = Dummy('a') + + partial = [] + + for d, n in Q.sqf_list_include(all=True): + b = d.as_expr() + U += [ u.diff(x, n - 1) ] + + h = cancel(P_orig/Q_orig.quo(d**n)) / u**n + + H, subs = [h], [] + + for j in range(1, n): + H += [ H[-1].diff(x) / j ] + + for j in range(1, n + 1): + subs += [ (U[j - 1], b.diff(x, j) / j) ] + + for j in range(0, n): + P, Q = cancel(H[j]).as_numer_denom() + + for i in range(0, j + 1): + P = P.subs(*subs[j - i]) + + Q = Q.subs(*subs[0]) + + P = Poly(P, x) + Q = Poly(Q, x) + + G = P.gcd(d) + D = d.quo(G) + + B, g = Q.half_gcdex(D) + b = (P * B.quo(g)).rem(D) + + Dw = D.subs(x, next(dummygen)) + numer = Lambda(a, b.as_expr().subs(x, a)) + denom = Lambda(a, (x - a)) + exponent = n-j + + partial.append((Dw, numer, denom, exponent)) + + return partial + + +@public +def assemble_partfrac_list(partial_list): + r"""Reassemble a full partial fraction decomposition + from a structured result obtained by the function ``apart_list``. + + Examples + ======== + + This example is taken from Bronstein's original paper: + + >>> from sympy.polys.partfrac import apart_list, assemble_partfrac_list + >>> from sympy.abc import x + + >>> f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) + >>> pfd = apart_list(f) + >>> pfd + (1, + Poly(0, x, domain='ZZ'), + [(Poly(_w - 2, _w, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1), + (Poly(_w**2 - 1, _w, domain='ZZ'), Lambda(_a, -3*_a - 6), Lambda(_a, -_a + x), 2), + (Poly(_w + 1, _w, domain='ZZ'), Lambda(_a, -4), Lambda(_a, -_a + x), 1)]) + + >>> assemble_partfrac_list(pfd) + -4/(x + 1) - 3/(x + 1)**2 - 9/(x - 1)**2 + 4/(x - 2) + + If we happen to know some roots we can provide them easily inside the structure: + + >>> pfd = apart_list(2/(x**2-2)) + >>> pfd + (1, + Poly(0, x, domain='ZZ'), + [(Poly(_w**2 - 2, _w, domain='ZZ'), + Lambda(_a, _a/2), + Lambda(_a, -_a + x), + 1)]) + + >>> pfda = assemble_partfrac_list(pfd) + >>> pfda + RootSum(_w**2 - 2, Lambda(_a, _a/(-_a + x)))/2 + + >>> pfda.doit() + -sqrt(2)/(2*(x + sqrt(2))) + sqrt(2)/(2*(x - sqrt(2))) + + >>> from sympy import Dummy, Poly, Lambda, sqrt + >>> a = Dummy("a") + >>> pfd = (1, Poly(0, x, domain='ZZ'), [([sqrt(2),-sqrt(2)], Lambda(a, a/2), Lambda(a, -a + x), 1)]) + + >>> assemble_partfrac_list(pfd) + -sqrt(2)/(2*(x + sqrt(2))) + sqrt(2)/(2*(x - sqrt(2))) + + See Also + ======== + + apart, apart_list + """ + # Common factor + common = partial_list[0] + + # Polynomial part + polypart = partial_list[1] + pfd = polypart.as_expr() + + # Rational parts + for r, nf, df, ex in partial_list[2]: + if isinstance(r, Poly): + # Assemble in case the roots are given implicitly by a polynomials + an, nu = nf.variables, nf.expr + ad, de = df.variables, df.expr + # Hack to make dummies equal because Lambda created new Dummies + de = de.subs(ad[0], an[0]) + func = Lambda(tuple(an), nu/de**ex) + pfd += RootSum(r, func, auto=False, quadratic=False) + else: + # Assemble in case the roots are given explicitly by a list of algebraic numbers + for root in r: + pfd += nf(root)/df(root)**ex + + return common*pfd diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyclasses.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyclasses.py new file mode 100644 index 0000000000000000000000000000000000000000..1cc0e0f368ab07d64837e057b841ea991d9de223 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyclasses.py @@ -0,0 +1,3186 @@ +"""OO layer for several polynomial representations. """ + +from __future__ import annotations + +from sympy.external.gmpy import GROUND_TYPES + +from sympy.utilities.exceptions import sympy_deprecation_warning + +from sympy.core.numbers import oo +from sympy.core.sympify import CantSympify +from sympy.polys.polyutils import PicklableWithSlots, _sort_factors +from sympy.polys.domains import Domain, ZZ, QQ + +from sympy.polys.polyerrors import ( + CoercionFailed, + ExactQuotientFailed, + DomainError, + NotInvertible, +) + +from sympy.polys.densebasic import ( + ninf, + dmp_validate, + dup_normal, dmp_normal, + dup_convert, dmp_convert, + dmp_from_sympy, + dup_strip, + dmp_degree_in, + dmp_degree_list, + dmp_negative_p, + dmp_ground_LC, + dmp_ground_TC, + dmp_ground_nth, + dmp_one, dmp_ground, + dmp_zero, dmp_zero_p, dmp_one_p, dmp_ground_p, + dup_from_dict, dmp_from_dict, + dmp_to_dict, + dmp_deflate, + dmp_inject, dmp_eject, + dmp_terms_gcd, + dmp_list_terms, dmp_exclude, + dup_slice, dmp_slice_in, dmp_permute, + dmp_to_tuple,) + +from sympy.polys.densearith import ( + dmp_add_ground, + dmp_sub_ground, + dmp_mul_ground, + dmp_quo_ground, + dmp_exquo_ground, + dmp_abs, + dmp_neg, + dmp_add, + dmp_sub, + dmp_mul, + dmp_sqr, + dmp_pow, + dmp_pdiv, + dmp_prem, + dmp_pquo, + dmp_pexquo, + dmp_div, + dmp_rem, + dmp_quo, + dmp_exquo, + dmp_add_mul, dmp_sub_mul, + dmp_max_norm, + dmp_l1_norm, + dmp_l2_norm_squared) + +from sympy.polys.densetools import ( + dmp_clear_denoms, + dmp_integrate_in, + dmp_diff_in, + dmp_eval_in, + dup_revert, + dmp_ground_trunc, + dmp_ground_content, + dmp_ground_primitive, + dmp_ground_monic, + dmp_compose, + dup_decompose, + dup_shift, + dmp_shift, + dup_transform, + dmp_lift) + +from sympy.polys.euclidtools import ( + dup_half_gcdex, dup_gcdex, dup_invert, + dmp_subresultants, + dmp_resultant, + dmp_discriminant, + dmp_inner_gcd, + dmp_gcd, + dmp_lcm, + dmp_cancel) + +from sympy.polys.sqfreetools import ( + dup_gff_list, + dmp_norm, + dmp_sqf_p, + dmp_sqf_norm, + dmp_sqf_part, + dmp_sqf_list, dmp_sqf_list_include) + +from sympy.polys.factortools import ( + dup_cyclotomic_p, dmp_irreducible_p, + dmp_factor_list, dmp_factor_list_include) + +from sympy.polys.rootisolation import ( + dup_isolate_real_roots_sqf, + dup_isolate_real_roots, + dup_isolate_all_roots_sqf, + dup_isolate_all_roots, + dup_refine_real_root, + dup_count_real_roots, + dup_count_complex_roots, + dup_sturm, + dup_cauchy_upper_bound, + dup_cauchy_lower_bound, + dup_mignotte_sep_bound_squared) + +from sympy.polys.polyerrors import ( + UnificationFailed, + PolynomialError) + + +if GROUND_TYPES == 'flint': + import flint + def _supported_flint_domain(D): + return D.is_ZZ or D.is_QQ or D.is_FF and D._is_flint +else: + flint = None + def _supported_flint_domain(D): + return False + + +class DMP(CantSympify): + """Dense Multivariate Polynomials over `K`. """ + + __slots__ = () + + lev: int + dom: Domain + + def __new__(cls, rep, dom, lev=None): + + if lev is None: + rep, lev = dmp_validate(rep) + elif not isinstance(rep, list): + raise CoercionFailed("expected list, got %s" % type(rep)) + + return cls.new(rep, dom, lev) + + @classmethod + def new(cls, rep, dom, lev): + # It would be too slow to call _validate_args always at runtime. + # Ideally this checking would be handled by a static type checker. + # + #cls._validate_args(rep, dom, lev) + if flint is not None: + if lev == 0 and _supported_flint_domain(dom): + return DUP_Flint._new(rep, dom, lev) + + return DMP_Python._new(rep, dom, lev) + + @property + def rep(f): + """Get the representation of ``f``. """ + + sympy_deprecation_warning(""" + Accessing the ``DMP.rep`` attribute is deprecated. The internal + representation of ``DMP`` instances can now be ``DUP_Flint`` when the + ground types are ``flint``. In this case the ``DMP`` instance does not + have a ``rep`` attribute. Use ``DMP.to_list()`` instead. Using + ``DMP.to_list()`` also works in previous versions of SymPy. + """, + deprecated_since_version="1.13", + active_deprecations_target="dmp-rep", + ) + + return f.to_list() + + def to_best(f): + """Convert to DUP_Flint if possible. + + This method should be used when the domain or level is changed and it + potentially becomes possible to convert from DMP_Python to DUP_Flint. + """ + if flint is not None: + if isinstance(f, DMP_Python) and f.lev == 0 and _supported_flint_domain(f.dom): + return DUP_Flint.new(f._rep, f.dom, f.lev) + + return f + + @classmethod + def _validate_args(cls, rep, dom, lev): + assert isinstance(dom, Domain) + assert isinstance(lev, int) and lev >= 0 + + def validate_rep(rep, lev): + assert isinstance(rep, list) + if lev == 0: + assert all(dom.of_type(c) for c in rep) + else: + for r in rep: + validate_rep(r, lev - 1) + + validate_rep(rep, lev) + + @classmethod + def from_dict(cls, rep, lev, dom): + rep = dmp_from_dict(rep, lev, dom) + return cls.new(rep, dom, lev) + + @classmethod + def from_list(cls, rep, lev, dom): + """Create an instance of ``cls`` given a list of native coefficients. """ + return cls.new(dmp_convert(rep, lev, None, dom), dom, lev) + + @classmethod + def from_sympy_list(cls, rep, lev, dom): + """Create an instance of ``cls`` given a list of SymPy coefficients. """ + return cls.new(dmp_from_sympy(rep, lev, dom), dom, lev) + + @classmethod + def from_monoms_coeffs(cls, monoms, coeffs, lev, dom): + return cls(dict(list(zip(monoms, coeffs))), dom, lev) + + def convert(f, dom): + """Convert ``f`` to a ``DMP`` over the new domain. """ + if f.dom == dom: + return f + elif f.lev or flint is None: + return f._convert(dom) + elif isinstance(f, DUP_Flint): + if _supported_flint_domain(dom): + return f._convert(dom) + else: + return f.to_DMP_Python()._convert(dom) + elif isinstance(f, DMP_Python): + if _supported_flint_domain(dom): + return f._convert(dom).to_DUP_Flint() + else: + return f._convert(dom) + else: + raise RuntimeError("unreachable code") + + def _convert(f, dom): + raise NotImplementedError + + @classmethod + def zero(cls, lev, dom): + return DMP(dmp_zero(lev), dom, lev) + + @classmethod + def one(cls, lev, dom): + return DMP(dmp_one(lev, dom), dom, lev) + + def _one(f): + raise NotImplementedError + + def __repr__(f): + return "%s(%s, %s)" % (f.__class__.__name__, f.to_list(), f.dom) + + def __hash__(f): + return hash((f.__class__.__name__, f.to_tuple(), f.lev, f.dom)) + + def __getnewargs__(self): + return self.to_list(), self.dom, self.lev + + def ground_new(f, coeff): + """Construct a new ground instance of ``f``. """ + raise NotImplementedError + + def unify_DMP(f, g): + """Unify and return ``DMP`` instances of ``f`` and ``g``. """ + if not isinstance(g, DMP) or f.lev != g.lev: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if f.dom != g.dom: + dom = f.dom.unify(g.dom) + f = f.convert(dom) + g = g.convert(dom) + + return f, g + + def to_dict(f, zero=False): + """Convert ``f`` to a dict representation with native coefficients. """ + return dmp_to_dict(f.to_list(), f.lev, f.dom, zero=zero) + + def to_sympy_dict(f, zero=False): + """Convert ``f`` to a dict representation with SymPy coefficients. """ + rep = f.to_dict(zero=zero) + + for k, v in rep.items(): + rep[k] = f.dom.to_sympy(v) + + return rep + + def to_sympy_list(f): + """Convert ``f`` to a list representation with SymPy coefficients. """ + def sympify_nested_list(rep): + out = [] + for val in rep: + if isinstance(val, list): + out.append(sympify_nested_list(val)) + else: + out.append(f.dom.to_sympy(val)) + return out + + return sympify_nested_list(f.to_list()) + + def to_list(f): + """Convert ``f`` to a list representation with native coefficients. """ + raise NotImplementedError + + def to_tuple(f): + """ + Convert ``f`` to a tuple representation with native coefficients. + + This is needed for hashing. + """ + raise NotImplementedError + + def to_ring(f): + """Make the ground domain a ring. """ + return f.convert(f.dom.get_ring()) + + def to_field(f): + """Make the ground domain a field. """ + return f.convert(f.dom.get_field()) + + def to_exact(f): + """Make the ground domain exact. """ + return f.convert(f.dom.get_exact()) + + def slice(f, m, n, j=0): + """Take a continuous subsequence of terms of ``f``. """ + if not f.lev and not j: + return f._slice(m, n) + else: + return f._slice_lev(m, n, j) + + def _slice(f, m, n): + raise NotImplementedError + + def _slice_lev(f, m, n, j): + raise NotImplementedError + + def coeffs(f, order=None): + """Returns all non-zero coefficients from ``f`` in lex order. """ + return [ c for _, c in f.terms(order=order) ] + + def monoms(f, order=None): + """Returns all non-zero monomials from ``f`` in lex order. """ + return [ m for m, _ in f.terms(order=order) ] + + def terms(f, order=None): + """Returns all non-zero terms from ``f`` in lex order. """ + if f.is_zero: + zero_monom = (0,)*(f.lev + 1) + return [(zero_monom, f.dom.zero)] + else: + return f._terms(order=order) + + def _terms(f, order=None): + raise NotImplementedError + + def all_coeffs(f): + """Returns all coefficients from ``f``. """ + if f.lev: + raise PolynomialError('multivariate polynomials not supported') + + if not f: + return [f.dom.zero] + else: + return list(f.to_list()) + + def all_monoms(f): + """Returns all monomials from ``f``. """ + if f.lev: + raise PolynomialError('multivariate polynomials not supported') + + n = f.degree() + + if n < 0: + return [(0,)] + else: + return [ (n - i,) for i, c in enumerate(f.to_list()) ] + + def all_terms(f): + """Returns all terms from a ``f``. """ + if f.lev: + raise PolynomialError('multivariate polynomials not supported') + + n = f.degree() + + if n < 0: + return [((0,), f.dom.zero)] + else: + return [ ((n - i,), c) for i, c in enumerate(f.to_list()) ] + + def lift(f): + """Convert algebraic coefficients to rationals. """ + return f._lift().to_best() + + def _lift(f): + raise NotImplementedError + + def deflate(f): + """Reduce degree of `f` by mapping `x_i^m` to `y_i`. """ + raise NotImplementedError + + def inject(f, front=False): + """Inject ground domain generators into ``f``. """ + raise NotImplementedError + + def eject(f, dom, front=False): + """Eject selected generators into the ground domain. """ + raise NotImplementedError + + def exclude(f): + r""" + Remove useless generators from ``f``. + + Returns the removed generators and the new excluded ``f``. + + Examples + ======== + + >>> from sympy.polys.polyclasses import DMP + >>> from sympy.polys.domains import ZZ + + >>> DMP([[[ZZ(1)]], [[ZZ(1)], [ZZ(2)]]], ZZ).exclude() + ([2], DMP_Python([[1], [1, 2]], ZZ)) + + """ + J, F = f._exclude() + return J, F.to_best() + + def _exclude(f): + raise NotImplementedError + + def permute(f, P): + r""" + Returns a polynomial in `K[x_{P(1)}, ..., x_{P(n)}]`. + + Examples + ======== + + >>> from sympy.polys.polyclasses import DMP + >>> from sympy.polys.domains import ZZ + + >>> DMP([[[ZZ(2)], [ZZ(1), ZZ(0)]], [[]]], ZZ).permute([1, 0, 2]) + DMP_Python([[[2], []], [[1, 0], []]], ZZ) + + >>> DMP([[[ZZ(2)], [ZZ(1), ZZ(0)]], [[]]], ZZ).permute([1, 2, 0]) + DMP_Python([[[1], []], [[2, 0], []]], ZZ) + + """ + return f._permute(P) + + def _permute(f, P): + raise NotImplementedError + + def terms_gcd(f): + """Remove GCD of terms from the polynomial ``f``. """ + raise NotImplementedError + + def abs(f): + """Make all coefficients in ``f`` positive. """ + raise NotImplementedError + + def neg(f): + """Negate all coefficients in ``f``. """ + raise NotImplementedError + + def add_ground(f, c): + """Add an element of the ground domain to ``f``. """ + return f._add_ground(f.dom.convert(c)) + + def sub_ground(f, c): + """Subtract an element of the ground domain from ``f``. """ + return f._sub_ground(f.dom.convert(c)) + + def mul_ground(f, c): + """Multiply ``f`` by a an element of the ground domain. """ + return f._mul_ground(f.dom.convert(c)) + + def quo_ground(f, c): + """Quotient of ``f`` by a an element of the ground domain. """ + return f._quo_ground(f.dom.convert(c)) + + def exquo_ground(f, c): + """Exact quotient of ``f`` by a an element of the ground domain. """ + return f._exquo_ground(f.dom.convert(c)) + + def add(f, g): + """Add two multivariate polynomials ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._add(G) + + def sub(f, g): + """Subtract two multivariate polynomials ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._sub(G) + + def mul(f, g): + """Multiply two multivariate polynomials ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._mul(G) + + def sqr(f): + """Square a multivariate polynomial ``f``. """ + return f._sqr() + + def pow(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + if not isinstance(n, int): + raise TypeError("``int`` expected, got %s" % type(n)) + return f._pow(n) + + def pdiv(f, g): + """Polynomial pseudo-division of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._pdiv(G) + + def prem(f, g): + """Polynomial pseudo-remainder of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._prem(G) + + def pquo(f, g): + """Polynomial pseudo-quotient of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._pquo(G) + + def pexquo(f, g): + """Polynomial exact pseudo-quotient of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._pexquo(G) + + def div(f, g): + """Polynomial division with remainder of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._div(G) + + def rem(f, g): + """Computes polynomial remainder of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._rem(G) + + def quo(f, g): + """Computes polynomial quotient of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._quo(G) + + def exquo(f, g): + """Computes polynomial exact quotient of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._exquo(G) + + def _add_ground(f, c): + raise NotImplementedError + + def _sub_ground(f, c): + raise NotImplementedError + + def _mul_ground(f, c): + raise NotImplementedError + + def _quo_ground(f, c): + raise NotImplementedError + + def _exquo_ground(f, c): + raise NotImplementedError + + def _add(f, g): + raise NotImplementedError + + def _sub(f, g): + raise NotImplementedError + + def _mul(f, g): + raise NotImplementedError + + def _sqr(f): + raise NotImplementedError + + def _pow(f, n): + raise NotImplementedError + + def _pdiv(f, g): + raise NotImplementedError + + def _prem(f, g): + raise NotImplementedError + + def _pquo(f, g): + raise NotImplementedError + + def _pexquo(f, g): + raise NotImplementedError + + def _div(f, g): + raise NotImplementedError + + def _rem(f, g): + raise NotImplementedError + + def _quo(f, g): + raise NotImplementedError + + def _exquo(f, g): + raise NotImplementedError + + def degree(f, j=0): + """Returns the leading degree of ``f`` in ``x_j``. """ + if not isinstance(j, int): + raise TypeError("``int`` expected, got %s" % type(j)) + + return f._degree(j) + + def _degree(f, j): + raise NotImplementedError + + def degree_list(f): + """Returns a list of degrees of ``f``. """ + raise NotImplementedError + + def total_degree(f): + """Returns the total degree of ``f``. """ + raise NotImplementedError + + def homogenize(f, s): + """Return homogeneous polynomial of ``f``""" + td = f.total_degree() + result = {} + new_symbol = (s == len(f.terms()[0][0])) + for term in f.terms(): + d = sum(term[0]) + if d < td: + i = td - d + else: + i = 0 + if new_symbol: + result[term[0] + (i,)] = term[1] + else: + l = list(term[0]) + l[s] += i + result[tuple(l)] = term[1] + return DMP.from_dict(result, f.lev + int(new_symbol), f.dom) + + def homogeneous_order(f): + """Returns the homogeneous order of ``f``. """ + if f.is_zero: + return -oo + + monoms = f.monoms() + tdeg = sum(monoms[0]) + + for monom in monoms: + _tdeg = sum(monom) + + if _tdeg != tdeg: + return None + + return tdeg + + def LC(f): + """Returns the leading coefficient of ``f``. """ + raise NotImplementedError + + def TC(f): + """Returns the trailing coefficient of ``f``. """ + raise NotImplementedError + + def nth(f, *N): + """Returns the ``n``-th coefficient of ``f``. """ + if all(isinstance(n, int) for n in N): + return f._nth(N) + else: + raise TypeError("a sequence of integers expected") + + def _nth(f, N): + raise NotImplementedError + + def max_norm(f): + """Returns maximum norm of ``f``. """ + raise NotImplementedError + + def l1_norm(f): + """Returns l1 norm of ``f``. """ + raise NotImplementedError + + def l2_norm_squared(f): + """Return squared l2 norm of ``f``. """ + raise NotImplementedError + + def clear_denoms(f): + """Clear denominators, but keep the ground domain. """ + raise NotImplementedError + + def integrate(f, m=1, j=0): + """Computes the ``m``-th order indefinite integral of ``f`` in ``x_j``. """ + if not isinstance(m, int): + raise TypeError("``int`` expected, got %s" % type(m)) + + if not isinstance(j, int): + raise TypeError("``int`` expected, got %s" % type(j)) + + return f._integrate(m, j) + + def _integrate(f, m, j): + raise NotImplementedError + + def diff(f, m=1, j=0): + """Computes the ``m``-th order derivative of ``f`` in ``x_j``. """ + if not isinstance(m, int): + raise TypeError("``int`` expected, got %s" % type(m)) + + if not isinstance(j, int): + raise TypeError("``int`` expected, got %s" % type(j)) + + return f._diff(m, j) + + def _diff(f, m, j): + raise NotImplementedError + + def eval(f, a, j=0): + """Evaluates ``f`` at the given point ``a`` in ``x_j``. """ + if not isinstance(j, int): + raise TypeError("``int`` expected, got %s" % type(j)) + elif not (0 <= j <= f.lev): + raise ValueError("invalid variable index %s" % j) + + if f.lev: + return f._eval_lev(a, j) + else: + return f._eval(a) + + def _eval(f, a): + raise NotImplementedError + + def _eval_lev(f, a, j): + raise NotImplementedError + + def half_gcdex(f, g): + """Half extended Euclidean algorithm, if univariate. """ + F, G = f.unify_DMP(g) + + if F.lev: + raise ValueError('univariate polynomial expected') + + return F._half_gcdex(G) + + def _half_gcdex(f, g): + raise NotImplementedError + + def gcdex(f, g): + """Extended Euclidean algorithm, if univariate. """ + F, G = f.unify_DMP(g) + + if F.lev: + raise ValueError('univariate polynomial expected') + + if not F.dom.is_Field: + raise DomainError('ground domain must be a field') + + return F._gcdex(G) + + def _gcdex(f, g): + raise NotImplementedError + + def invert(f, g): + """Invert ``f`` modulo ``g``, if possible. """ + F, G = f.unify_DMP(g) + + if F.lev: + raise ValueError('univariate polynomial expected') + + return F._invert(G) + + def _invert(f, g): + raise NotImplementedError + + def revert(f, n): + """Compute ``f**(-1)`` mod ``x**n``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._revert(n) + + def _revert(f, n): + raise NotImplementedError + + def subresultants(f, g): + """Computes subresultant PRS sequence of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._subresultants(G) + + def _subresultants(f, g): + raise NotImplementedError + + def resultant(f, g, includePRS=False): + """Computes resultant of ``f`` and ``g`` via PRS. """ + F, G = f.unify_DMP(g) + if includePRS: + return F._resultant_includePRS(G) + else: + return F._resultant(G) + + def _resultant(f, g, includePRS=False): + raise NotImplementedError + + def discriminant(f): + """Computes discriminant of ``f``. """ + raise NotImplementedError + + def cofactors(f, g): + """Returns GCD of ``f`` and ``g`` and their cofactors. """ + F, G = f.unify_DMP(g) + return F._cofactors(G) + + def _cofactors(f, g): + raise NotImplementedError + + def gcd(f, g): + """Returns polynomial GCD of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._gcd(G) + + def _gcd(f, g): + raise NotImplementedError + + def lcm(f, g): + """Returns polynomial LCM of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._lcm(G) + + def _lcm(f, g): + raise NotImplementedError + + def cancel(f, g, include=True): + """Cancel common factors in a rational function ``f/g``. """ + F, G = f.unify_DMP(g) + + if include: + return F._cancel_include(G) + else: + return F._cancel(G) + + def _cancel(f, g): + raise NotImplementedError + + def _cancel_include(f, g): + raise NotImplementedError + + def trunc(f, p): + """Reduce ``f`` modulo a constant ``p``. """ + return f._trunc(f.dom.convert(p)) + + def _trunc(f, p): + raise NotImplementedError + + def monic(f): + """Divides all coefficients by ``LC(f)``. """ + raise NotImplementedError + + def content(f): + """Returns GCD of polynomial coefficients. """ + raise NotImplementedError + + def primitive(f): + """Returns content and a primitive form of ``f``. """ + raise NotImplementedError + + def compose(f, g): + """Computes functional composition of ``f`` and ``g``. """ + F, G = f.unify_DMP(g) + return F._compose(G) + + def _compose(f, g): + raise NotImplementedError + + def decompose(f): + """Computes functional decomposition of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._decompose() + + def _decompose(f): + raise NotImplementedError + + def shift(f, a): + """Efficiently compute Taylor shift ``f(x + a)``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._shift(f.dom.convert(a)) + + def shift_list(f, a): + """Efficiently compute Taylor shift ``f(X + A)``. """ + a = [f.dom.convert(ai) for ai in a] + return f._shift_list(a) + + def _shift(f, a): + raise NotImplementedError + + def transform(f, p, q): + """Evaluate functional transformation ``q**n * f(p/q)``.""" + if f.lev: + raise ValueError('univariate polynomial expected') + + P, Q = p.unify_DMP(q) + F, P = f.unify_DMP(P) + F, Q = F.unify_DMP(Q) + + return F._transform(P, Q) + + def _transform(f, p, q): + raise NotImplementedError + + def sturm(f): + """Computes the Sturm sequence of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._sturm() + + def _sturm(f): + raise NotImplementedError + + def cauchy_upper_bound(f): + """Computes the Cauchy upper bound on the roots of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._cauchy_upper_bound() + + def _cauchy_upper_bound(f): + raise NotImplementedError + + def cauchy_lower_bound(f): + """Computes the Cauchy lower bound on the nonzero roots of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._cauchy_lower_bound() + + def _cauchy_lower_bound(f): + raise NotImplementedError + + def mignotte_sep_bound_squared(f): + """Computes the squared Mignotte bound on root separations of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._mignotte_sep_bound_squared() + + def _mignotte_sep_bound_squared(f): + raise NotImplementedError + + def gff_list(f): + """Computes greatest factorial factorization of ``f``. """ + if f.lev: + raise ValueError('univariate polynomial expected') + + return f._gff_list() + + def _gff_list(f): + raise NotImplementedError + + def norm(f): + """Computes ``Norm(f)``.""" + raise NotImplementedError + + def sqf_norm(f): + """Computes square-free norm of ``f``. """ + raise NotImplementedError + + def sqf_part(f): + """Computes square-free part of ``f``. """ + raise NotImplementedError + + def sqf_list(f, all=False): + """Returns a list of square-free factors of ``f``. """ + raise NotImplementedError + + def sqf_list_include(f, all=False): + """Returns a list of square-free factors of ``f``. """ + raise NotImplementedError + + def factor_list(f): + """Returns a list of irreducible factors of ``f``. """ + raise NotImplementedError + + def factor_list_include(f): + """Returns a list of irreducible factors of ``f``. """ + raise NotImplementedError + + def intervals(f, all=False, eps=None, inf=None, sup=None, fast=False, sqf=False): + """Compute isolating intervals for roots of ``f``. """ + if f.lev: + raise PolynomialError("Cannot isolate roots of a multivariate polynomial") + + if all and sqf: + return f._isolate_all_roots_sqf(eps=eps, inf=inf, sup=sup, fast=fast) + elif all and not sqf: + return f._isolate_all_roots(eps=eps, inf=inf, sup=sup, fast=fast) + elif not all and sqf: + return f._isolate_real_roots_sqf(eps=eps, inf=inf, sup=sup, fast=fast) + else: + return f._isolate_real_roots(eps=eps, inf=inf, sup=sup, fast=fast) + + def _isolate_all_roots(f, eps, inf, sup, fast): + raise NotImplementedError + + def _isolate_all_roots_sqf(f, eps, inf, sup, fast): + raise NotImplementedError + + def _isolate_real_roots(f, eps, inf, sup, fast): + raise NotImplementedError + + def _isolate_real_roots_sqf(f, eps, inf, sup, fast): + raise NotImplementedError + + def refine_root(f, s, t, eps=None, steps=None, fast=False): + """ + Refine an isolating interval to the given precision. + + ``eps`` should be a rational number. + + """ + if f.lev: + raise PolynomialError( + "Cannot refine a root of a multivariate polynomial") + + return f._refine_real_root(s, t, eps=eps, steps=steps, fast=fast) + + def _refine_real_root(f, s, t, eps, steps, fast): + raise NotImplementedError + + def count_real_roots(f, inf=None, sup=None): + """Return the number of real roots of ``f`` in ``[inf, sup]``. """ + raise NotImplementedError + + def count_complex_roots(f, inf=None, sup=None): + """Return the number of complex roots of ``f`` in ``[inf, sup]``. """ + raise NotImplementedError + + @property + def is_zero(f): + """Returns ``True`` if ``f`` is a zero polynomial. """ + raise NotImplementedError + + @property + def is_one(f): + """Returns ``True`` if ``f`` is a unit polynomial. """ + raise NotImplementedError + + @property + def is_ground(f): + """Returns ``True`` if ``f`` is an element of the ground domain. """ + raise NotImplementedError + + @property + def is_sqf(f): + """Returns ``True`` if ``f`` is a square-free polynomial. """ + raise NotImplementedError + + @property + def is_monic(f): + """Returns ``True`` if the leading coefficient of ``f`` is one. """ + raise NotImplementedError + + @property + def is_primitive(f): + """Returns ``True`` if the GCD of the coefficients of ``f`` is one. """ + raise NotImplementedError + + @property + def is_linear(f): + """Returns ``True`` if ``f`` is linear in all its variables. """ + raise NotImplementedError + + @property + def is_quadratic(f): + """Returns ``True`` if ``f`` is quadratic in all its variables. """ + raise NotImplementedError + + @property + def is_monomial(f): + """Returns ``True`` if ``f`` is zero or has only one term. """ + raise NotImplementedError + + @property + def is_homogeneous(f): + """Returns ``True`` if ``f`` is a homogeneous polynomial. """ + raise NotImplementedError + + @property + def is_irreducible(f): + """Returns ``True`` if ``f`` has no factors over its domain. """ + raise NotImplementedError + + @property + def is_cyclotomic(f): + """Returns ``True`` if ``f`` is a cyclotomic polynomial. """ + raise NotImplementedError + + def __abs__(f): + return f.abs() + + def __neg__(f): + return f.neg() + + def __add__(f, g): + if isinstance(g, DMP): + return f.add(g) + else: + try: + return f.add_ground(g) + except CoercionFailed: + return NotImplemented + + def __radd__(f, g): + return f.__add__(g) + + def __sub__(f, g): + if isinstance(g, DMP): + return f.sub(g) + else: + try: + return f.sub_ground(g) + except CoercionFailed: + return NotImplemented + + def __rsub__(f, g): + return (-f).__add__(g) + + def __mul__(f, g): + if isinstance(g, DMP): + return f.mul(g) + else: + try: + return f.mul_ground(g) + except CoercionFailed: + return NotImplemented + + def __rmul__(f, g): + return f.__mul__(g) + + def __truediv__(f, g): + if isinstance(g, DMP): + return f.exquo(g) + else: + try: + return f.mul_ground(g) + except CoercionFailed: + return NotImplemented + + def __rtruediv__(f, g): + if isinstance(g, DMP): + return g.exquo(f) + else: + try: + return f._one().mul_ground(g).exquo(f) + except CoercionFailed: + return NotImplemented + + def __pow__(f, n): + return f.pow(n) + + def __divmod__(f, g): + return f.div(g) + + def __mod__(f, g): + return f.rem(g) + + def __floordiv__(f, g): + if isinstance(g, DMP): + return f.quo(g) + else: + try: + return f.quo_ground(g) + except TypeError: + return NotImplemented + + def __eq__(f, g): + if f is g: + return True + if not isinstance(g, DMP): + return NotImplemented + try: + F, G = f.unify_DMP(g) + except UnificationFailed: + return False + else: + return F._strict_eq(G) + + def _strict_eq(f, g): + raise NotImplementedError + + def eq(f, g, strict=False): + if not strict: + return f == g + else: + return f._strict_eq(g) + + def ne(f, g, strict=False): + return not f.eq(g, strict=strict) + + def __lt__(f, g): + F, G = f.unify_DMP(g) + return F.to_list() < G.to_list() + + def __le__(f, g): + F, G = f.unify_DMP(g) + return F.to_list() <= G.to_list() + + def __gt__(f, g): + F, G = f.unify_DMP(g) + return F.to_list() > G.to_list() + + def __ge__(f, g): + F, G = f.unify_DMP(g) + return F.to_list() >= G.to_list() + + def __bool__(f): + return not f.is_zero + + +class DMP_Python(DMP): + """Dense Multivariate Polynomials over `K`. """ + + __slots__ = ('_rep', 'dom', 'lev') + + @classmethod + def _new(cls, rep, dom, lev): + obj = object.__new__(cls) + obj._rep = rep + obj.lev = lev + obj.dom = dom + return obj + + def _strict_eq(f, g): + if type(f) != type(g): + return False + return f.lev == g.lev and f.dom == g.dom and f._rep == g._rep + + def per(f, rep): + """Create a DMP out of the given representation. """ + return f._new(rep, f.dom, f.lev) + + def ground_new(f, coeff): + """Construct a new ground instance of ``f``. """ + return f._new(dmp_ground(coeff, f.lev), f.dom, f.lev) + + def _one(f): + return f.one(f.lev, f.dom) + + def unify(f, g): + """Unify representations of two multivariate polynomials. """ + # XXX: This function is not really used any more since there is + # unify_DMP now. + if not isinstance(g, DMP) or f.lev != g.lev: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if f.dom == g.dom: + return f.lev, f.dom, f.per, f._rep, g._rep + else: + lev, dom = f.lev, f.dom.unify(g.dom) + + F = dmp_convert(f._rep, lev, f.dom, dom) + G = dmp_convert(g._rep, lev, g.dom, dom) + + def per(rep): + return f._new(rep, dom, lev) + + return lev, dom, per, F, G + + def to_DUP_Flint(f): + """Convert ``f`` to a Flint representation. """ + return DUP_Flint._new(f._rep, f.dom, f.lev) + + def to_list(f): + """Convert ``f`` to a list representation with native coefficients. """ + return list(f._rep) + + def to_tuple(f): + """Convert ``f`` to a tuple representation with native coefficients. """ + return dmp_to_tuple(f._rep, f.lev) + + def _convert(f, dom): + """Convert the ground domain of ``f``. """ + return f._new(dmp_convert(f._rep, f.lev, f.dom, dom), dom, f.lev) + + def _slice(f, m, n): + """Take a continuous subsequence of terms of ``f``. """ + rep = dup_slice(f._rep, m, n, f.dom) + return f._new(rep, f.dom, f.lev) + + def _slice_lev(f, m, n, j): + """Take a continuous subsequence of terms of ``f``. """ + rep = dmp_slice_in(f._rep, m, n, j, f.lev, f.dom) + return f._new(rep, f.dom, f.lev) + + def _terms(f, order=None): + """Returns all non-zero terms from ``f`` in lex order. """ + return dmp_list_terms(f._rep, f.lev, f.dom, order=order) + + def _lift(f): + """Convert algebraic coefficients to rationals. """ + r = dmp_lift(f._rep, f.lev, f.dom) + return f._new(r, f.dom.dom, f.lev) + + def deflate(f): + """Reduce degree of `f` by mapping `x_i^m` to `y_i`. """ + J, F = dmp_deflate(f._rep, f.lev, f.dom) + return J, f.per(F) + + def inject(f, front=False): + """Inject ground domain generators into ``f``. """ + F, lev = dmp_inject(f._rep, f.lev, f.dom, front=front) + # XXX: domain and level changed here + return f._new(F, f.dom.dom, lev) + + def eject(f, dom, front=False): + """Eject selected generators into the ground domain. """ + F = dmp_eject(f._rep, f.lev, dom, front=front) + # XXX: domain and level changed here + return f._new(F, dom, f.lev - len(dom.symbols)) + + def _exclude(f): + """Remove useless generators from ``f``. """ + J, F, u = dmp_exclude(f._rep, f.lev, f.dom) + # XXX: level changed here + return J, f._new(F, f.dom, u) + + def _permute(f, P): + """Returns a polynomial in `K[x_{P(1)}, ..., x_{P(n)}]`. """ + return f.per(dmp_permute(f._rep, P, f.lev, f.dom)) + + def terms_gcd(f): + """Remove GCD of terms from the polynomial ``f``. """ + J, F = dmp_terms_gcd(f._rep, f.lev, f.dom) + return J, f.per(F) + + def _add_ground(f, c): + """Add an element of the ground domain to ``f``. """ + return f.per(dmp_add_ground(f._rep, c, f.lev, f.dom)) + + def _sub_ground(f, c): + """Subtract an element of the ground domain from ``f``. """ + return f.per(dmp_sub_ground(f._rep, c, f.lev, f.dom)) + + def _mul_ground(f, c): + """Multiply ``f`` by a an element of the ground domain. """ + return f.per(dmp_mul_ground(f._rep, c, f.lev, f.dom)) + + def _quo_ground(f, c): + """Quotient of ``f`` by a an element of the ground domain. """ + return f.per(dmp_quo_ground(f._rep, c, f.lev, f.dom)) + + def _exquo_ground(f, c): + """Exact quotient of ``f`` by a an element of the ground domain. """ + return f.per(dmp_exquo_ground(f._rep, c, f.lev, f.dom)) + + def abs(f): + """Make all coefficients in ``f`` positive. """ + return f.per(dmp_abs(f._rep, f.lev, f.dom)) + + def neg(f): + """Negate all coefficients in ``f``. """ + return f.per(dmp_neg(f._rep, f.lev, f.dom)) + + def _add(f, g): + """Add two multivariate polynomials ``f`` and ``g``. """ + return f.per(dmp_add(f._rep, g._rep, f.lev, f.dom)) + + def _sub(f, g): + """Subtract two multivariate polynomials ``f`` and ``g``. """ + return f.per(dmp_sub(f._rep, g._rep, f.lev, f.dom)) + + def _mul(f, g): + """Multiply two multivariate polynomials ``f`` and ``g``. """ + return f.per(dmp_mul(f._rep, g._rep, f.lev, f.dom)) + + def sqr(f): + """Square a multivariate polynomial ``f``. """ + return f.per(dmp_sqr(f._rep, f.lev, f.dom)) + + def _pow(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + return f.per(dmp_pow(f._rep, n, f.lev, f.dom)) + + def _pdiv(f, g): + """Polynomial pseudo-division of ``f`` and ``g``. """ + q, r = dmp_pdiv(f._rep, g._rep, f.lev, f.dom) + return f.per(q), f.per(r) + + def _prem(f, g): + """Polynomial pseudo-remainder of ``f`` and ``g``. """ + return f.per(dmp_prem(f._rep, g._rep, f.lev, f.dom)) + + def _pquo(f, g): + """Polynomial pseudo-quotient of ``f`` and ``g``. """ + return f.per(dmp_pquo(f._rep, g._rep, f.lev, f.dom)) + + def _pexquo(f, g): + """Polynomial exact pseudo-quotient of ``f`` and ``g``. """ + return f.per(dmp_pexquo(f._rep, g._rep, f.lev, f.dom)) + + def _div(f, g): + """Polynomial division with remainder of ``f`` and ``g``. """ + q, r = dmp_div(f._rep, g._rep, f.lev, f.dom) + return f.per(q), f.per(r) + + def _rem(f, g): + """Computes polynomial remainder of ``f`` and ``g``. """ + return f.per(dmp_rem(f._rep, g._rep, f.lev, f.dom)) + + def _quo(f, g): + """Computes polynomial quotient of ``f`` and ``g``. """ + return f.per(dmp_quo(f._rep, g._rep, f.lev, f.dom)) + + def _exquo(f, g): + """Computes polynomial exact quotient of ``f`` and ``g``. """ + return f.per(dmp_exquo(f._rep, g._rep, f.lev, f.dom)) + + def _degree(f, j=0): + """Returns the leading degree of ``f`` in ``x_j``. """ + return dmp_degree_in(f._rep, j, f.lev) + + def degree_list(f): + """Returns a list of degrees of ``f``. """ + return dmp_degree_list(f._rep, f.lev) + + def total_degree(f): + """Returns the total degree of ``f``. """ + return max(sum(m) for m in f.monoms()) + + def LC(f): + """Returns the leading coefficient of ``f``. """ + return dmp_ground_LC(f._rep, f.lev, f.dom) + + def TC(f): + """Returns the trailing coefficient of ``f``. """ + return dmp_ground_TC(f._rep, f.lev, f.dom) + + def _nth(f, N): + """Returns the ``n``-th coefficient of ``f``. """ + return dmp_ground_nth(f._rep, N, f.lev, f.dom) + + def max_norm(f): + """Returns maximum norm of ``f``. """ + return dmp_max_norm(f._rep, f.lev, f.dom) + + def l1_norm(f): + """Returns l1 norm of ``f``. """ + return dmp_l1_norm(f._rep, f.lev, f.dom) + + def l2_norm_squared(f): + """Return squared l2 norm of ``f``. """ + return dmp_l2_norm_squared(f._rep, f.lev, f.dom) + + def clear_denoms(f): + """Clear denominators, but keep the ground domain. """ + coeff, F = dmp_clear_denoms(f._rep, f.lev, f.dom) + return coeff, f.per(F) + + def _integrate(f, m=1, j=0): + """Computes the ``m``-th order indefinite integral of ``f`` in ``x_j``. """ + return f.per(dmp_integrate_in(f._rep, m, j, f.lev, f.dom)) + + def _diff(f, m=1, j=0): + """Computes the ``m``-th order derivative of ``f`` in ``x_j``. """ + return f.per(dmp_diff_in(f._rep, m, j, f.lev, f.dom)) + + def _eval(f, a): + return dmp_eval_in(f._rep, f.dom.convert(a), 0, f.lev, f.dom) + + def _eval_lev(f, a, j): + rep = dmp_eval_in(f._rep, f.dom.convert(a), j, f.lev, f.dom) + return f.new(rep, f.dom, f.lev - 1) + + def _half_gcdex(f, g): + """Half extended Euclidean algorithm, if univariate. """ + s, h = dup_half_gcdex(f._rep, g._rep, f.dom) + return f.per(s), f.per(h) + + def _gcdex(f, g): + """Extended Euclidean algorithm, if univariate. """ + s, t, h = dup_gcdex(f._rep, g._rep, f.dom) + return f.per(s), f.per(t), f.per(h) + + def _invert(f, g): + """Invert ``f`` modulo ``g``, if possible. """ + s = dup_invert(f._rep, g._rep, f.dom) + return f.per(s) + + def _revert(f, n): + """Compute ``f**(-1)`` mod ``x**n``. """ + return f.per(dup_revert(f._rep, n, f.dom)) + + def _subresultants(f, g): + """Computes subresultant PRS sequence of ``f`` and ``g``. """ + R = dmp_subresultants(f._rep, g._rep, f.lev, f.dom) + return list(map(f.per, R)) + + def _resultant_includePRS(f, g): + """Computes resultant of ``f`` and ``g`` via PRS. """ + res, R = dmp_resultant(f._rep, g._rep, f.lev, f.dom, includePRS=True) + if f.lev: + res = f.new(res, f.dom, f.lev - 1) + return res, list(map(f.per, R)) + + def _resultant(f, g): + res = dmp_resultant(f._rep, g._rep, f.lev, f.dom) + if f.lev: + res = f.new(res, f.dom, f.lev - 1) + return res + + def discriminant(f): + """Computes discriminant of ``f``. """ + res = dmp_discriminant(f._rep, f.lev, f.dom) + if f.lev: + res = f.new(res, f.dom, f.lev - 1) + return res + + def _cofactors(f, g): + """Returns GCD of ``f`` and ``g`` and their cofactors. """ + h, cff, cfg = dmp_inner_gcd(f._rep, g._rep, f.lev, f.dom) + return f.per(h), f.per(cff), f.per(cfg) + + def _gcd(f, g): + """Returns polynomial GCD of ``f`` and ``g``. """ + return f.per(dmp_gcd(f._rep, g._rep, f.lev, f.dom)) + + def _lcm(f, g): + """Returns polynomial LCM of ``f`` and ``g``. """ + return f.per(dmp_lcm(f._rep, g._rep, f.lev, f.dom)) + + def _cancel(f, g): + """Cancel common factors in a rational function ``f/g``. """ + cF, cG, F, G = dmp_cancel(f._rep, g._rep, f.lev, f.dom, include=False) + return cF, cG, f.per(F), f.per(G) + + def _cancel_include(f, g): + """Cancel common factors in a rational function ``f/g``. """ + F, G = dmp_cancel(f._rep, g._rep, f.lev, f.dom, include=True) + return f.per(F), f.per(G) + + def _trunc(f, p): + """Reduce ``f`` modulo a constant ``p``. """ + return f.per(dmp_ground_trunc(f._rep, p, f.lev, f.dom)) + + def monic(f): + """Divides all coefficients by ``LC(f)``. """ + return f.per(dmp_ground_monic(f._rep, f.lev, f.dom)) + + def content(f): + """Returns GCD of polynomial coefficients. """ + return dmp_ground_content(f._rep, f.lev, f.dom) + + def primitive(f): + """Returns content and a primitive form of ``f``. """ + cont, F = dmp_ground_primitive(f._rep, f.lev, f.dom) + return cont, f.per(F) + + def _compose(f, g): + """Computes functional composition of ``f`` and ``g``. """ + return f.per(dmp_compose(f._rep, g._rep, f.lev, f.dom)) + + def _decompose(f): + """Computes functional decomposition of ``f``. """ + return list(map(f.per, dup_decompose(f._rep, f.dom))) + + def _shift(f, a): + """Efficiently compute Taylor shift ``f(x + a)``. """ + return f.per(dup_shift(f._rep, a, f.dom)) + + def _shift_list(f, a): + """Efficiently compute Taylor shift ``f(X + A)``. """ + return f.per(dmp_shift(f._rep, a, f.lev, f.dom)) + + def _transform(f, p, q): + """Evaluate functional transformation ``q**n * f(p/q)``.""" + return f.per(dup_transform(f._rep, p._rep, q._rep, f.dom)) + + def _sturm(f): + """Computes the Sturm sequence of ``f``. """ + return list(map(f.per, dup_sturm(f._rep, f.dom))) + + def _cauchy_upper_bound(f): + """Computes the Cauchy upper bound on the roots of ``f``. """ + return dup_cauchy_upper_bound(f._rep, f.dom) + + def _cauchy_lower_bound(f): + """Computes the Cauchy lower bound on the nonzero roots of ``f``. """ + return dup_cauchy_lower_bound(f._rep, f.dom) + + def _mignotte_sep_bound_squared(f): + """Computes the squared Mignotte bound on root separations of ``f``. """ + return dup_mignotte_sep_bound_squared(f._rep, f.dom) + + def _gff_list(f): + """Computes greatest factorial factorization of ``f``. """ + return [ (f.per(g), k) for g, k in dup_gff_list(f._rep, f.dom) ] + + def norm(f): + """Computes ``Norm(f)``.""" + r = dmp_norm(f._rep, f.lev, f.dom) + return f.new(r, f.dom.dom, f.lev) + + def sqf_norm(f): + """Computes square-free norm of ``f``. """ + s, g, r = dmp_sqf_norm(f._rep, f.lev, f.dom) + return s, f.per(g), f.new(r, f.dom.dom, f.lev) + + def sqf_part(f): + """Computes square-free part of ``f``. """ + return f.per(dmp_sqf_part(f._rep, f.lev, f.dom)) + + def sqf_list(f, all=False): + """Returns a list of square-free factors of ``f``. """ + coeff, factors = dmp_sqf_list(f._rep, f.lev, f.dom, all) + return coeff, [ (f.per(g), k) for g, k in factors ] + + def sqf_list_include(f, all=False): + """Returns a list of square-free factors of ``f``. """ + factors = dmp_sqf_list_include(f._rep, f.lev, f.dom, all) + return [ (f.per(g), k) for g, k in factors ] + + def factor_list(f): + """Returns a list of irreducible factors of ``f``. """ + coeff, factors = dmp_factor_list(f._rep, f.lev, f.dom) + return coeff, [ (f.per(g), k) for g, k in factors ] + + def factor_list_include(f): + """Returns a list of irreducible factors of ``f``. """ + factors = dmp_factor_list_include(f._rep, f.lev, f.dom) + return [ (f.per(g), k) for g, k in factors ] + + def _isolate_real_roots(f, eps, inf, sup, fast): + return dup_isolate_real_roots(f._rep, f.dom, eps=eps, inf=inf, sup=sup, fast=fast) + + def _isolate_real_roots_sqf(f, eps, inf, sup, fast): + return dup_isolate_real_roots_sqf(f._rep, f.dom, eps=eps, inf=inf, sup=sup, fast=fast) + + def _isolate_all_roots(f, eps, inf, sup, fast): + return dup_isolate_all_roots(f._rep, f.dom, eps=eps, inf=inf, sup=sup, fast=fast) + + def _isolate_all_roots_sqf(f, eps, inf, sup, fast): + return dup_isolate_all_roots_sqf(f._rep, f.dom, eps=eps, inf=inf, sup=sup, fast=fast) + + def _refine_real_root(f, s, t, eps, steps, fast): + return dup_refine_real_root(f._rep, s, t, f.dom, eps=eps, steps=steps, fast=fast) + + def count_real_roots(f, inf=None, sup=None): + """Return the number of real roots of ``f`` in ``[inf, sup]``. """ + return dup_count_real_roots(f._rep, f.dom, inf=inf, sup=sup) + + def count_complex_roots(f, inf=None, sup=None): + """Return the number of complex roots of ``f`` in ``[inf, sup]``. """ + return dup_count_complex_roots(f._rep, f.dom, inf=inf, sup=sup) + + @property + def is_zero(f): + """Returns ``True`` if ``f`` is a zero polynomial. """ + return dmp_zero_p(f._rep, f.lev) + + @property + def is_one(f): + """Returns ``True`` if ``f`` is a unit polynomial. """ + return dmp_one_p(f._rep, f.lev, f.dom) + + @property + def is_ground(f): + """Returns ``True`` if ``f`` is an element of the ground domain. """ + return dmp_ground_p(f._rep, None, f.lev) + + @property + def is_sqf(f): + """Returns ``True`` if ``f`` is a square-free polynomial. """ + return dmp_sqf_p(f._rep, f.lev, f.dom) + + @property + def is_monic(f): + """Returns ``True`` if the leading coefficient of ``f`` is one. """ + return f.dom.is_one(dmp_ground_LC(f._rep, f.lev, f.dom)) + + @property + def is_primitive(f): + """Returns ``True`` if the GCD of the coefficients of ``f`` is one. """ + return f.dom.is_one(dmp_ground_content(f._rep, f.lev, f.dom)) + + @property + def is_linear(f): + """Returns ``True`` if ``f`` is linear in all its variables. """ + return all(sum(monom) <= 1 for monom in dmp_to_dict(f._rep, f.lev, f.dom).keys()) + + @property + def is_quadratic(f): + """Returns ``True`` if ``f`` is quadratic in all its variables. """ + return all(sum(monom) <= 2 for monom in dmp_to_dict(f._rep, f.lev, f.dom).keys()) + + @property + def is_monomial(f): + """Returns ``True`` if ``f`` is zero or has only one term. """ + return len(f.to_dict()) <= 1 + + @property + def is_homogeneous(f): + """Returns ``True`` if ``f`` is a homogeneous polynomial. """ + return f.homogeneous_order() is not None + + @property + def is_irreducible(f): + """Returns ``True`` if ``f`` has no factors over its domain. """ + return dmp_irreducible_p(f._rep, f.lev, f.dom) + + @property + def is_cyclotomic(f): + """Returns ``True`` if ``f`` is a cyclotomic polynomial. """ + if not f.lev: + return dup_cyclotomic_p(f._rep, f.dom) + else: + return False + + +class DUP_Flint(DMP): + """Dense Multivariate Polynomials over `K`. """ + + lev = 0 + + __slots__ = ('_rep', 'dom', '_cls') + + def __reduce__(self): + return self.__class__, (self.to_list(), self.dom, self.lev) + + @classmethod + def _new(cls, rep, dom, lev): + rep = cls._flint_poly(rep[::-1], dom, lev) + return cls.from_rep(rep, dom) + + def to_list(f): + """Convert ``f`` to a list representation with native coefficients. """ + return f._rep.coeffs()[::-1] + + @classmethod + def _flint_poly(cls, rep, dom, lev): + assert _supported_flint_domain(dom) + assert lev == 0 + flint_cls = cls._get_flint_poly_cls(dom) + return flint_cls(rep) + + @classmethod + def _get_flint_poly_cls(cls, dom): + if dom.is_ZZ: + return flint.fmpz_poly + elif dom.is_QQ: + return flint.fmpq_poly + elif dom.is_FF: + return dom._poly_ctx + else: + raise RuntimeError("Domain %s is not supported with flint" % dom) + + @classmethod + def from_rep(cls, rep, dom): + """Create a DMP from the given representation. """ + + if dom.is_ZZ: + assert isinstance(rep, flint.fmpz_poly) + _cls = flint.fmpz_poly + elif dom.is_QQ: + assert isinstance(rep, flint.fmpq_poly) + _cls = flint.fmpq_poly + elif dom.is_FF: + assert isinstance(rep, (flint.nmod_poly, flint.fmpz_mod_poly)) + c = dom.characteristic() + __cls = type(rep) + _cls = lambda e: __cls(e, c) + else: + raise RuntimeError("Domain %s is not supported with flint" % dom) + + obj = object.__new__(cls) + obj.dom = dom + obj._rep = rep + obj._cls = _cls + + return obj + + def _strict_eq(f, g): + if type(f) != type(g): + return False + return f.dom == g.dom and f._rep == g._rep + + def ground_new(f, coeff): + """Construct a new ground instance of ``f``. """ + return f.from_rep(f._cls([coeff]), f.dom) + + def _one(f): + return f.ground_new(f.dom.one) + + def unify(f, g): + """Unify representations of two polynomials. """ + raise RuntimeError + + def to_DMP_Python(f): + """Convert ``f`` to a Python native representation. """ + return DMP_Python._new(f.to_list(), f.dom, f.lev) + + def to_tuple(f): + """Convert ``f`` to a tuple representation with native coefficients. """ + return tuple(f.to_list()) + + def _convert(f, dom): + """Convert the ground domain of ``f``. """ + if dom == QQ and f.dom == ZZ: + return f.from_rep(flint.fmpq_poly(f._rep), dom) + elif _supported_flint_domain(dom) and _supported_flint_domain(f.dom): + # XXX: python-flint should provide a faster way to do this. + return f.to_DMP_Python()._convert(dom).to_DUP_Flint() + else: + raise RuntimeError(f"DUP_Flint: Cannot convert {f.dom} to {dom}") + + def _slice(f, m, n): + """Take a continuous subsequence of terms of ``f``. """ + coeffs = f._rep.coeffs()[m:n] + return f.from_rep(f._cls(coeffs), f.dom) + + def _slice_lev(f, m, n, j): + """Take a continuous subsequence of terms of ``f``. """ + # Only makes sense for multivariate polynomials + raise NotImplementedError + + def _terms(f, order=None): + """Returns all non-zero terms from ``f`` in lex order. """ + if order is None or order.alias == 'lex': + terms = [ ((n,), c) for n, c in enumerate(f._rep.coeffs()) if c ] + return terms[::-1] + else: + # XXX: InverseOrder (ilex) comes here. We could handle that case + # efficiently by reversing the coefficients but it is not clear + # how to test if the order is InverseOrder. + # + # Otherwise why would the order ever be different for univariate + # polynomials? + return f.to_DMP_Python()._terms(order=order) + + def _lift(f): + """Convert algebraic coefficients to rationals. """ + # This is for algebraic number fields which DUP_Flint does not support + raise NotImplementedError + + def deflate(f): + """Reduce degree of `f` by mapping `x_i^m` to `y_i`. """ + # XXX: Check because otherwise this segfaults with python-flint: + # + # >>> flint.fmpz_poly([]).deflation() + # Exception (fmpz_poly_deflate). Division by zero. + # Aborted (core dumped + # + if f.is_zero: + return (1,), f + g, n = f._rep.deflation() + return (n,), f.from_rep(g, f.dom) + + def inject(f, front=False): + """Inject ground domain generators into ``f``. """ + # Ground domain would need to be a poly ring + raise NotImplementedError + + def eject(f, dom, front=False): + """Eject selected generators into the ground domain. """ + # Only makes sense for multivariate polynomials + raise NotImplementedError + + def _exclude(f): + """Remove useless generators from ``f``. """ + # Only makes sense for multivariate polynomials + raise NotImplementedError + + def _permute(f, P): + """Returns a polynomial in `K[x_{P(1)}, ..., x_{P(n)}]`. """ + # Only makes sense for multivariate polynomials + raise NotImplementedError + + def terms_gcd(f): + """Remove GCD of terms from the polynomial ``f``. """ + # XXX: python-flint should have primitive, content, etc methods. + J, F = f.to_DMP_Python().terms_gcd() + return J, F.to_DUP_Flint() + + def _add_ground(f, c): + """Add an element of the ground domain to ``f``. """ + return f.from_rep(f._rep + c, f.dom) + + def _sub_ground(f, c): + """Subtract an element of the ground domain from ``f``. """ + return f.from_rep(f._rep - c, f.dom) + + def _mul_ground(f, c): + """Multiply ``f`` by a an element of the ground domain. """ + return f.from_rep(f._rep * c, f.dom) + + def _quo_ground(f, c): + """Quotient of ``f`` by a an element of the ground domain. """ + return f.from_rep(f._rep // c, f.dom) + + def _exquo_ground(f, c): + """Exact quotient of ``f`` by an element of the ground domain. """ + q, r = divmod(f._rep, c) + if r: + raise ExactQuotientFailed(f, c) + return f.from_rep(q, f.dom) + + def abs(f): + """Make all coefficients in ``f`` positive. """ + return f.to_DMP_Python().abs().to_DUP_Flint() + + def neg(f): + """Negate all coefficients in ``f``. """ + return f.from_rep(-f._rep, f.dom) + + def _add(f, g): + """Add two multivariate polynomials ``f`` and ``g``. """ + return f.from_rep(f._rep + g._rep, f.dom) + + def _sub(f, g): + """Subtract two multivariate polynomials ``f`` and ``g``. """ + return f.from_rep(f._rep - g._rep, f.dom) + + def _mul(f, g): + """Multiply two multivariate polynomials ``f`` and ``g``. """ + return f.from_rep(f._rep * g._rep, f.dom) + + def sqr(f): + """Square a multivariate polynomial ``f``. """ + return f.from_rep(f._rep ** 2, f.dom) + + def _pow(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + return f.from_rep(f._rep ** n, f.dom) + + def _pdiv(f, g): + """Polynomial pseudo-division of ``f`` and ``g``. """ + d = f.degree() - g.degree() + 1 + q, r = divmod(g.LC()**d * f._rep, g._rep) + return f.from_rep(q, f.dom), f.from_rep(r, f.dom) + + def _prem(f, g): + """Polynomial pseudo-remainder of ``f`` and ``g``. """ + d = f.degree() - g.degree() + 1 + q = (g.LC()**d * f._rep) % g._rep + return f.from_rep(q, f.dom) + + def _pquo(f, g): + """Polynomial pseudo-quotient of ``f`` and ``g``. """ + d = f.degree() - g.degree() + 1 + r = (g.LC()**d * f._rep) // g._rep + return f.from_rep(r, f.dom) + + def _pexquo(f, g): + """Polynomial exact pseudo-quotient of ``f`` and ``g``. """ + d = f.degree() - g.degree() + 1 + q, r = divmod(g.LC()**d * f._rep, g._rep) + if r: + raise ExactQuotientFailed(f, g) + return f.from_rep(q, f.dom) + + def _div(f, g): + """Polynomial division with remainder of ``f`` and ``g``. """ + if f.dom.is_Field: + q, r = divmod(f._rep, g._rep) + return f.from_rep(q, f.dom), f.from_rep(r, f.dom) + else: + # XXX: python-flint defines division in ZZ[x] differently + q, r = f.to_DMP_Python()._div(g.to_DMP_Python()) + return q.to_DUP_Flint(), r.to_DUP_Flint() + + def _rem(f, g): + """Computes polynomial remainder of ``f`` and ``g``. """ + return f.from_rep(f._rep % g._rep, f.dom) + + def _quo(f, g): + """Computes polynomial quotient of ``f`` and ``g``. """ + return f.from_rep(f._rep // g._rep, f.dom) + + def _exquo(f, g): + """Computes polynomial exact quotient of ``f`` and ``g``. """ + q, r = f._div(g) + if r: + raise ExactQuotientFailed(f, g) + return q + + def _degree(f, j=0): + """Returns the leading degree of ``f`` in ``x_j``. """ + d = f._rep.degree() + if d == -1: + d = ninf + return d + + def degree_list(f): + """Returns a list of degrees of ``f``. """ + return ( f._degree() ,) + + def total_degree(f): + """Returns the total degree of ``f``. """ + return f._degree() + + def LC(f): + """Returns the leading coefficient of ``f``. """ + return f._rep[f._rep.degree()] + + def TC(f): + """Returns the trailing coefficient of ``f``. """ + return f._rep[0] + + def _nth(f, N): + """Returns the ``n``-th coefficient of ``f``. """ + [n] = N + return f._rep[n] + + def max_norm(f): + """Returns maximum norm of ``f``. """ + return f.to_DMP_Python().max_norm() + + def l1_norm(f): + """Returns l1 norm of ``f``. """ + return f.to_DMP_Python().l1_norm() + + def l2_norm_squared(f): + """Return squared l2 norm of ``f``. """ + return f.to_DMP_Python().l2_norm_squared() + + def clear_denoms(f): + """Clear denominators, but keep the ground domain. """ + R = f.dom + if R.is_QQ: + denom = f._rep.denom() + numer = f.from_rep(f._cls(f._rep.numer()), f.dom) + return denom, numer + elif R.is_ZZ or R.is_FiniteField: + return R.one, f + else: + raise NotImplementedError + + def _integrate(f, m=1, j=0): + """Computes the ``m``-th order indefinite integral of ``f`` in ``x_j``. """ + assert j == 0 + if f.dom.is_Field: + rep = f._rep + for i in range(m): + rep = rep.integral() + return f.from_rep(rep, f.dom) + else: + return f.to_DMP_Python()._integrate(m=m, j=j).to_DUP_Flint() + + def _diff(f, m=1, j=0): + """Computes the ``m``-th order derivative of ``f``. """ + assert j == 0 + rep = f._rep + for i in range(m): + rep = rep.derivative() + return f.from_rep(rep, f.dom) + + def _eval(f, a): + # XXX: This method is called with many different input types. Ideally + # we could use e.g. fmpz_poly.__call__ here but more thought needs to + # go into which types this is supposed to be called with and what types + # it should return. + return f.to_DMP_Python()._eval(a) + + def _eval_lev(f, a, j): + # Only makes sense for multivariate polynomials + raise NotImplementedError + + def _half_gcdex(f, g): + """Half extended Euclidean algorithm. """ + s, h = f.to_DMP_Python()._half_gcdex(g.to_DMP_Python()) + return s.to_DUP_Flint(), h.to_DUP_Flint() + + def _gcdex(f, g): + """Extended Euclidean algorithm. """ + h, s, t = f._rep.xgcd(g._rep) + return f.from_rep(s, f.dom), f.from_rep(t, f.dom), f.from_rep(h, f.dom) + + def _invert(f, g): + """Invert ``f`` modulo ``g``, if possible. """ + R = f.dom + if R.is_Field: + gcd, F_inv, _ = f._rep.xgcd(g._rep) + # XXX: Should be gcd != 1 but nmod_poly does not compare equal to + # other types. + if gcd != 0*gcd + 1: + raise NotInvertible("zero divisor") + return f.from_rep(F_inv, R) + else: + # fmpz_poly does not have xgcd or invert and this is not well + # defined in general. + return f.to_DMP_Python()._invert(g.to_DMP_Python()).to_DUP_Flint() + + def _revert(f, n): + """Compute ``f**(-1)`` mod ``x**n``. """ + # XXX: Use fmpz_series etc for reversion? + # Maybe python-flint should provide revert for fmpz_poly... + return f.to_DMP_Python()._revert(n).to_DUP_Flint() + + def _subresultants(f, g): + """Computes subresultant PRS sequence of ``f`` and ``g``. """ + # XXX: Maybe _fmpz_poly_pseudo_rem_cohen could be used... + R = f.to_DMP_Python()._subresultants(g.to_DMP_Python()) + return [ g.to_DUP_Flint() for g in R ] + + def _resultant_includePRS(f, g): + """Computes resultant of ``f`` and ``g`` via PRS. """ + # XXX: Maybe _fmpz_poly_pseudo_rem_cohen could be used... + res, R = f.to_DMP_Python()._resultant_includePRS(g.to_DMP_Python()) + return res, [ g.to_DUP_Flint() for g in R ] + + def _resultant(f, g): + """Computes resultant of ``f`` and ``g``. """ + # XXX: Use fmpz_mpoly etc when possible... + return f.to_DMP_Python()._resultant(g.to_DMP_Python()) + + def discriminant(f): + """Computes discriminant of ``f``. """ + # XXX: Use fmpz_mpoly etc when possible... + return f.to_DMP_Python().discriminant() + + def _cofactors(f, g): + """Returns GCD of ``f`` and ``g`` and their cofactors. """ + h = f.gcd(g) + return h, f.exquo(h), g.exquo(h) + + def _gcd(f, g): + """Returns polynomial GCD of ``f`` and ``g``. """ + return f.from_rep(f._rep.gcd(g._rep), f.dom) + + def _lcm(f, g): + """Returns polynomial LCM of ``f`` and ``g``. """ + # XXX: python-flint should have a lcm method + if not (f and g): + return f.ground_new(f.dom.zero) + + l = f._mul(g)._exquo(f._gcd(g)) + + if l.dom.is_Field: + l = l.monic() + elif l.LC() < 0: + l = l.neg() + + return l + + def _cancel(f, g): + """Cancel common factors in a rational function ``f/g``. """ + assert f.dom == g.dom + R = f.dom + + # Think carefully about how to handle denominators and coefficient + # canonicalisation if more domains are permitted... + assert R.is_ZZ or R.is_QQ or R.is_FiniteField + + if R.is_FiniteField: + h = f._gcd(g) + F, G = f.exquo(h), g.exquo(h) + return R.one, R.one, F, G + + if R.is_QQ: + cG, F = f.clear_denoms() + cF, G = g.clear_denoms() + else: + cG, F = R.one, f + cF, G = R.one, g + + cH = cF.gcd(cG) + cF, cG = cF // cH, cG // cH + + H = F._gcd(G) + F, G = F.exquo(H), G.exquo(H) + + f_neg = F.LC() < 0 + g_neg = G.LC() < 0 + + if f_neg and g_neg: + F, G = F.neg(), G.neg() + elif f_neg: + cF, F = -cF, F.neg() + elif g_neg: + cF, G = -cF, G.neg() + + return cF, cG, F, G + + def _cancel_include(f, g): + """Cancel common factors in a rational function ``f/g``. """ + cF, cG, F, G = f._cancel(g) + return F._mul_ground(cF), G._mul_ground(cG) + + def _trunc(f, p): + """Reduce ``f`` modulo a constant ``p``. """ + return f.to_DMP_Python()._trunc(p).to_DUP_Flint() + + def monic(f): + """Divides all coefficients by ``LC(f)``. """ + # XXX: python-flint should add monic + return f._exquo_ground(f.LC()) + + def content(f): + """Returns GCD of polynomial coefficients. """ + # XXX: python-flint should have a content method + return f.to_DMP_Python().content() + + def primitive(f): + """Returns content and a primitive form of ``f``. """ + cont = f.content() + if f.is_zero: + return f.dom.zero, f + prim = f._exquo_ground(cont) + return cont, prim + + def _compose(f, g): + """Computes functional composition of ``f`` and ``g``. """ + return f.from_rep(f._rep(g._rep), f.dom) + + def _decompose(f): + """Computes functional decomposition of ``f``. """ + return [ g.to_DUP_Flint() for g in f.to_DMP_Python()._decompose() ] + + def _shift(f, a): + """Efficiently compute Taylor shift ``f(x + a)``. """ + x_plus_a = f._cls([a, f.dom.one]) + return f.from_rep(f._rep(x_plus_a), f.dom) + + def _transform(f, p, q): + """Evaluate functional transformation ``q**n * f(p/q)``.""" + F, P, Q = f.to_DMP_Python(), p.to_DMP_Python(), q.to_DMP_Python() + return F.transform(P, Q).to_DUP_Flint() + + def _sturm(f): + """Computes the Sturm sequence of ``f``. """ + return [ g.to_DUP_Flint() for g in f.to_DMP_Python()._sturm() ] + + def _cauchy_upper_bound(f): + """Computes the Cauchy upper bound on the roots of ``f``. """ + return f.to_DMP_Python()._cauchy_upper_bound() + + def _cauchy_lower_bound(f): + """Computes the Cauchy lower bound on the nonzero roots of ``f``. """ + return f.to_DMP_Python()._cauchy_lower_bound() + + def _mignotte_sep_bound_squared(f): + """Computes the squared Mignotte bound on root separations of ``f``. """ + return f.to_DMP_Python()._mignotte_sep_bound_squared() + + def _gff_list(f): + """Computes greatest factorial factorization of ``f``. """ + F = f.to_DMP_Python() + return [ (g.to_DUP_Flint(), k) for g, k in F.gff_list() ] + + def norm(f): + """Computes ``Norm(f)``.""" + # This is for algebraic number fields which DUP_Flint does not support + raise NotImplementedError + + def sqf_norm(f): + """Computes square-free norm of ``f``. """ + # This is for algebraic number fields which DUP_Flint does not support + raise NotImplementedError + + def sqf_part(f): + """Computes square-free part of ``f``. """ + return f._exquo(f._gcd(f._diff())) + + def sqf_list(f, all=False): + """Returns a list of square-free factors of ``f``. """ + # XXX: python-flint should provide square free factorisation. + coeff, factors = f.to_DMP_Python().sqf_list(all=all) + return coeff, [ (g.to_DUP_Flint(), k) for g, k in factors ] + + def sqf_list_include(f, all=False): + """Returns a list of square-free factors of ``f``. """ + factors = f.to_DMP_Python().sqf_list_include(all=all) + return [ (g.to_DUP_Flint(), k) for g, k in factors ] + + def factor_list(f): + """Returns a list of irreducible factors of ``f``. """ + + if f.dom.is_ZZ or f.dom.is_FF: + # python-flint matches polys here + coeff, factors = f._rep.factor() + factors = [ (f.from_rep(g, f.dom), k) for g, k in factors ] + + elif f.dom.is_QQ: + # python-flint returns monic factors over QQ whereas polys returns + # denominator free factors. + coeff, factors = f._rep.factor() + factors_monic = [ (f.from_rep(g, f.dom), k) for g, k in factors ] + + # Absorb the denominators into coeff + factors = [] + for g, k in factors_monic: + d, g = g.clear_denoms() + coeff /= d**k + factors.append((g, k)) + + else: + # Check carefully when adding more domains here... + raise RuntimeError("Domain %s is not supported with flint" % f.dom) + + # We need to match the way that polys orders the factors + factors = f._sort_factors(factors) + + return coeff, factors + + def factor_list_include(f): + """Returns a list of irreducible factors of ``f``. """ + # XXX: factor_list_include seems to be broken in general: + # + # >>> Poly(2*(x - 1)**3, x).factor_list_include() + # [(Poly(2*x - 2, x, domain='ZZ'), 3)] + # + # Let's not try to implement it here. + factors = f.to_DMP_Python().factor_list_include() + return [ (g.to_DUP_Flint(), k) for g, k in factors ] + + def _sort_factors(f, factors): + """Sort a list of factors to canonical order. """ + # Convert the factors to lists and use _sort_factors from polys + factors = [ (g.to_list(), k) for g, k in factors ] + factors = _sort_factors(factors, multiple=True) + to_dup_flint = lambda g: f.from_rep(f._cls(g[::-1]), f.dom) + return [ (to_dup_flint(g), k) for g, k in factors ] + + def _isolate_real_roots(f, eps, inf, sup, fast): + return f.to_DMP_Python()._isolate_real_roots(eps, inf, sup, fast) + + def _isolate_real_roots_sqf(f, eps, inf, sup, fast): + return f.to_DMP_Python()._isolate_real_roots_sqf(eps, inf, sup, fast) + + def _isolate_all_roots(f, eps, inf, sup, fast): + # fmpz_poly and fmpq_poly have a complex_roots method that could be + # used here. It probably makes more sense to add analogous methods in + # python-flint though. + return f.to_DMP_Python()._isolate_all_roots(eps, inf, sup, fast) + + def _isolate_all_roots_sqf(f, eps, inf, sup, fast): + return f.to_DMP_Python()._isolate_all_roots_sqf(eps, inf, sup, fast) + + def _refine_real_root(f, s, t, eps, steps, fast): + return f.to_DMP_Python()._refine_real_root(s, t, eps, steps, fast) + + def count_real_roots(f, inf=None, sup=None): + """Return the number of real roots of ``f`` in ``[inf, sup]``. """ + return f.to_DMP_Python().count_real_roots(inf=inf, sup=sup) + + def count_complex_roots(f, inf=None, sup=None): + """Return the number of complex roots of ``f`` in ``[inf, sup]``. """ + return f.to_DMP_Python().count_complex_roots(inf=inf, sup=sup) + + @property + def is_zero(f): + """Returns ``True`` if ``f`` is a zero polynomial. """ + return not f._rep + + @property + def is_one(f): + """Returns ``True`` if ``f`` is a unit polynomial. """ + return f._rep == f.dom.one + + @property + def is_ground(f): + """Returns ``True`` if ``f`` is an element of the ground domain. """ + return f._rep.degree() <= 0 + + @property + def is_linear(f): + """Returns ``True`` if ``f`` is linear in all its variables. """ + return f._rep.degree() <= 1 + + @property + def is_quadratic(f): + """Returns ``True`` if ``f`` is quadratic in all its variables. """ + return f._rep.degree() <= 2 + + @property + def is_monomial(f): + """Returns ``True`` if ``f`` is zero or has only one term. """ + fr = f._rep + return fr.degree() < 0 or not any(fr[n] for n in range(fr.degree())) + + @property + def is_monic(f): + """Returns ``True`` if the leading coefficient of ``f`` is one. """ + return f.LC() == f.dom.one + + @property + def is_primitive(f): + """Returns ``True`` if the GCD of the coefficients of ``f`` is one. """ + return f.to_DMP_Python().is_primitive + + @property + def is_homogeneous(f): + """Returns ``True`` if ``f`` is a homogeneous polynomial. """ + return f.to_DMP_Python().is_homogeneous + + @property + def is_sqf(f): + """Returns ``True`` if ``f`` is a square-free polynomial. """ + g = f._rep.gcd(f._rep.derivative()) + return g.degree() <= 0 + + @property + def is_irreducible(f): + """Returns ``True`` if ``f`` has no factors over its domain. """ + _, factors = f._rep.factor() + if len(factors) == 0: + return True + elif len(factors) == 1: + return factors[0][1] == 1 + else: + return False + + @property + def is_cyclotomic(f): + """Returns ``True`` if ``f`` is a cyclotomic polynomial. """ + if f.dom.is_QQ: + try: + f = f.convert(ZZ) + except CoercionFailed: + return False + if f.dom.is_ZZ: + return bool(f._rep.is_cyclotomic()) + else: + # This is what dup_cyclotomic_p does... + return False + + +def init_normal_DMF(num, den, lev, dom): + return DMF(dmp_normal(num, lev, dom), + dmp_normal(den, lev, dom), dom, lev) + + +class DMF(PicklableWithSlots, CantSympify): + """Dense Multivariate Fractions over `K`. """ + + __slots__ = ('num', 'den', 'lev', 'dom') + + def __init__(self, rep, dom, lev=None): + num, den, lev = self._parse(rep, dom, lev) + num, den = dmp_cancel(num, den, lev, dom) + + self.num = num + self.den = den + self.lev = lev + self.dom = dom + + @classmethod + def new(cls, rep, dom, lev=None): + num, den, lev = cls._parse(rep, dom, lev) + + obj = object.__new__(cls) + + obj.num = num + obj.den = den + obj.lev = lev + obj.dom = dom + + return obj + + def ground_new(self, rep): + return self.new(rep, self.dom, self.lev) + + @classmethod + def _parse(cls, rep, dom, lev=None): + if isinstance(rep, tuple): + num, den = rep + + if lev is not None: + if isinstance(num, dict): + num = dmp_from_dict(num, lev, dom) + + if isinstance(den, dict): + den = dmp_from_dict(den, lev, dom) + else: + num, num_lev = dmp_validate(num) + den, den_lev = dmp_validate(den) + + if num_lev == den_lev: + lev = num_lev + else: + raise ValueError('inconsistent number of levels') + + if dmp_zero_p(den, lev): + raise ZeroDivisionError('fraction denominator') + + if dmp_zero_p(num, lev): + den = dmp_one(lev, dom) + else: + if dmp_negative_p(den, lev, dom): + num = dmp_neg(num, lev, dom) + den = dmp_neg(den, lev, dom) + else: + num = rep + + if lev is not None: + if isinstance(num, dict): + num = dmp_from_dict(num, lev, dom) + elif not isinstance(num, list): + num = dmp_ground(dom.convert(num), lev) + else: + num, lev = dmp_validate(num) + + den = dmp_one(lev, dom) + + return num, den, lev + + def __repr__(f): + return "%s((%s, %s), %s)" % (f.__class__.__name__, f.num, f.den, f.dom) + + def __hash__(f): + return hash((f.__class__.__name__, dmp_to_tuple(f.num, f.lev), + dmp_to_tuple(f.den, f.lev), f.lev, f.dom)) + + def poly_unify(f, g): + """Unify a multivariate fraction and a polynomial. """ + if not isinstance(g, DMP) or f.lev != g.lev: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if f.dom == g.dom: + return (f.lev, f.dom, f.per, (f.num, f.den), g._rep) + else: + lev, dom = f.lev, f.dom.unify(g.dom) + + F = (dmp_convert(f.num, lev, f.dom, dom), + dmp_convert(f.den, lev, f.dom, dom)) + + G = dmp_convert(g._rep, lev, g.dom, dom) + + def per(num, den, cancel=True, kill=False, lev=lev): + if kill: + if not lev: + return num/den + else: + lev = lev - 1 + + if cancel: + num, den = dmp_cancel(num, den, lev, dom) + + return f.__class__.new((num, den), dom, lev) + + return lev, dom, per, F, G + + def frac_unify(f, g): + """Unify representations of two multivariate fractions. """ + if not isinstance(g, DMF) or f.lev != g.lev: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if f.dom == g.dom: + return (f.lev, f.dom, f.per, (f.num, f.den), + (g.num, g.den)) + else: + lev, dom = f.lev, f.dom.unify(g.dom) + + F = (dmp_convert(f.num, lev, f.dom, dom), + dmp_convert(f.den, lev, f.dom, dom)) + + G = (dmp_convert(g.num, lev, g.dom, dom), + dmp_convert(g.den, lev, g.dom, dom)) + + def per(num, den, cancel=True, kill=False, lev=lev): + if kill: + if not lev: + return num/den + else: + lev = lev - 1 + + if cancel: + num, den = dmp_cancel(num, den, lev, dom) + + return f.__class__.new((num, den), dom, lev) + + return lev, dom, per, F, G + + def per(f, num, den, cancel=True, kill=False): + """Create a DMF out of the given representation. """ + lev, dom = f.lev, f.dom + + if kill: + if not lev: + return num/den + else: + lev -= 1 + + if cancel: + num, den = dmp_cancel(num, den, lev, dom) + + return f.__class__.new((num, den), dom, lev) + + def half_per(f, rep, kill=False): + """Create a DMP out of the given representation. """ + lev = f.lev + + if kill: + if not lev: + return rep + else: + lev -= 1 + + return DMP(rep, f.dom, lev) + + @classmethod + def zero(cls, lev, dom): + return cls.new(0, dom, lev) + + @classmethod + def one(cls, lev, dom): + return cls.new(1, dom, lev) + + def numer(f): + """Returns the numerator of ``f``. """ + return f.half_per(f.num) + + def denom(f): + """Returns the denominator of ``f``. """ + return f.half_per(f.den) + + def cancel(f): + """Remove common factors from ``f.num`` and ``f.den``. """ + return f.per(f.num, f.den) + + def neg(f): + """Negate all coefficients in ``f``. """ + return f.per(dmp_neg(f.num, f.lev, f.dom), f.den, cancel=False) + + def add_ground(f, c): + """Add an element of the ground domain to ``f``. """ + return f + f.ground_new(c) + + def add(f, g): + """Add two multivariate fractions ``f`` and ``g``. """ + if isinstance(g, DMP): + lev, dom, per, (F_num, F_den), G = f.poly_unify(g) + num, den = dmp_add_mul(F_num, F_den, G, lev, dom), F_den + else: + lev, dom, per, F, G = f.frac_unify(g) + (F_num, F_den), (G_num, G_den) = F, G + + num = dmp_add(dmp_mul(F_num, G_den, lev, dom), + dmp_mul(F_den, G_num, lev, dom), lev, dom) + den = dmp_mul(F_den, G_den, lev, dom) + + return per(num, den) + + def sub(f, g): + """Subtract two multivariate fractions ``f`` and ``g``. """ + if isinstance(g, DMP): + lev, dom, per, (F_num, F_den), G = f.poly_unify(g) + num, den = dmp_sub_mul(F_num, F_den, G, lev, dom), F_den + else: + lev, dom, per, F, G = f.frac_unify(g) + (F_num, F_den), (G_num, G_den) = F, G + + num = dmp_sub(dmp_mul(F_num, G_den, lev, dom), + dmp_mul(F_den, G_num, lev, dom), lev, dom) + den = dmp_mul(F_den, G_den, lev, dom) + + return per(num, den) + + def mul(f, g): + """Multiply two multivariate fractions ``f`` and ``g``. """ + if isinstance(g, DMP): + lev, dom, per, (F_num, F_den), G = f.poly_unify(g) + num, den = dmp_mul(F_num, G, lev, dom), F_den + else: + lev, dom, per, F, G = f.frac_unify(g) + (F_num, F_den), (G_num, G_den) = F, G + + num = dmp_mul(F_num, G_num, lev, dom) + den = dmp_mul(F_den, G_den, lev, dom) + + return per(num, den) + + def pow(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + if isinstance(n, int): + num, den = f.num, f.den + if n < 0: + num, den, n = den, num, -n + return f.per(dmp_pow(num, n, f.lev, f.dom), + dmp_pow(den, n, f.lev, f.dom), cancel=False) + else: + raise TypeError("``int`` expected, got %s" % type(n)) + + def quo(f, g): + """Computes quotient of fractions ``f`` and ``g``. """ + if isinstance(g, DMP): + lev, dom, per, (F_num, F_den), G = f.poly_unify(g) + num, den = F_num, dmp_mul(F_den, G, lev, dom) + else: + lev, dom, per, F, G = f.frac_unify(g) + (F_num, F_den), (G_num, G_den) = F, G + + num = dmp_mul(F_num, G_den, lev, dom) + den = dmp_mul(F_den, G_num, lev, dom) + + return per(num, den) + + exquo = quo + + def invert(f, check=True): + """Computes inverse of a fraction ``f``. """ + return f.per(f.den, f.num, cancel=False) + + @property + def is_zero(f): + """Returns ``True`` if ``f`` is a zero fraction. """ + return dmp_zero_p(f.num, f.lev) + + @property + def is_one(f): + """Returns ``True`` if ``f`` is a unit fraction. """ + return dmp_one_p(f.num, f.lev, f.dom) and \ + dmp_one_p(f.den, f.lev, f.dom) + + def __neg__(f): + return f.neg() + + def __add__(f, g): + if isinstance(g, (DMP, DMF)): + return f.add(g) + elif g in f.dom: + return f.add_ground(f.dom.convert(g)) + + try: + return f.add(f.half_per(g)) + except (TypeError, CoercionFailed, NotImplementedError): + return NotImplemented + + def __radd__(f, g): + return f.__add__(g) + + def __sub__(f, g): + if isinstance(g, (DMP, DMF)): + return f.sub(g) + + try: + return f.sub(f.half_per(g)) + except (TypeError, CoercionFailed, NotImplementedError): + return NotImplemented + + def __rsub__(f, g): + return (-f).__add__(g) + + def __mul__(f, g): + if isinstance(g, (DMP, DMF)): + return f.mul(g) + + try: + return f.mul(f.half_per(g)) + except (TypeError, CoercionFailed, NotImplementedError): + return NotImplemented + + def __rmul__(f, g): + return f.__mul__(g) + + def __pow__(f, n): + return f.pow(n) + + def __truediv__(f, g): + if isinstance(g, (DMP, DMF)): + return f.quo(g) + + try: + return f.quo(f.half_per(g)) + except (TypeError, CoercionFailed, NotImplementedError): + return NotImplemented + + def __rtruediv__(self, g): + return self.invert(check=False)*g + + def __eq__(f, g): + try: + if isinstance(g, DMP): + _, _, _, (F_num, F_den), G = f.poly_unify(g) + + if f.lev == g.lev: + return dmp_one_p(F_den, f.lev, f.dom) and F_num == G + else: + _, _, _, F, G = f.frac_unify(g) + + if f.lev == g.lev: + return F == G + except UnificationFailed: + pass + + return False + + def __ne__(f, g): + try: + if isinstance(g, DMP): + _, _, _, (F_num, F_den), G = f.poly_unify(g) + + if f.lev == g.lev: + return not (dmp_one_p(F_den, f.lev, f.dom) and F_num == G) + else: + _, _, _, F, G = f.frac_unify(g) + + if f.lev == g.lev: + return F != G + except UnificationFailed: + pass + + return True + + def __lt__(f, g): + _, _, _, F, G = f.frac_unify(g) + return F < G + + def __le__(f, g): + _, _, _, F, G = f.frac_unify(g) + return F <= G + + def __gt__(f, g): + _, _, _, F, G = f.frac_unify(g) + return F > G + + def __ge__(f, g): + _, _, _, F, G = f.frac_unify(g) + return F >= G + + def __bool__(f): + return not dmp_zero_p(f.num, f.lev) + + +def init_normal_ANP(rep, mod, dom): + return ANP(dup_normal(rep, dom), + dup_normal(mod, dom), dom) + + +class ANP(CantSympify): + """Dense Algebraic Number Polynomials over a field. """ + + __slots__ = ('_rep', '_mod', 'dom') + + def __new__(cls, rep, mod, dom): + if isinstance(rep, DMP): + pass + elif type(rep) is dict: # don't use isinstance + rep = DMP(dup_from_dict(rep, dom), dom, 0) + else: + if isinstance(rep, list): + rep = [dom.convert(a) for a in rep] + else: + rep = [dom.convert(rep)] + rep = DMP(dup_strip(rep), dom, 0) + + if isinstance(mod, DMP): + pass + elif isinstance(mod, dict): + mod = DMP(dup_from_dict(mod, dom), dom, 0) + else: + mod = DMP(dup_strip(mod), dom, 0) + + return cls.new(rep, mod, dom) + + @classmethod + def new(cls, rep, mod, dom): + if not (rep.dom == mod.dom == dom): + raise RuntimeError("Inconsistent domain") + obj = super().__new__(cls) + obj._rep = rep + obj._mod = mod + obj.dom = dom + return obj + + # XXX: It should be possible to use __getnewargs__ rather than __reduce__ + # but it doesn't work for some reason. Probably this would be easier if + # python-flint supported pickling for polynomial types. + def __reduce__(self): + return ANP, (self.rep, self.mod, self.dom) + + @property + def rep(self): + return self._rep.to_list() + + @property + def mod(self): + return self.mod_to_list() + + def to_DMP(self): + return self._rep + + def mod_to_DMP(self): + return self._mod + + def per(f, rep): + return f.new(rep, f._mod, f.dom) + + def __repr__(f): + return "%s(%s, %s, %s)" % (f.__class__.__name__, f._rep.to_list(), f._mod.to_list(), f.dom) + + def __hash__(f): + return hash((f.__class__.__name__, f.to_tuple(), f._mod.to_tuple(), f.dom)) + + def convert(f, dom): + """Convert ``f`` to a ``ANP`` over a new domain. """ + if f.dom == dom: + return f + else: + return f.new(f._rep.convert(dom), f._mod.convert(dom), dom) + + def unify(f, g): + """Unify representations of two algebraic numbers. """ + + # XXX: This unify method is not used any more because unify_ANP is used + # instead. + + if not isinstance(g, ANP) or f.mod != g.mod: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if f.dom == g.dom: + return f.dom, f.per, f.rep, g.rep, f.mod + else: + dom = f.dom.unify(g.dom) + + F = dup_convert(f.rep, f.dom, dom) + G = dup_convert(g.rep, g.dom, dom) + + if dom != f.dom and dom != g.dom: + mod = dup_convert(f.mod, f.dom, dom) + else: + if dom == f.dom: + mod = f.mod + else: + mod = g.mod + + per = lambda rep: ANP(rep, mod, dom) + + return dom, per, F, G, mod + + def unify_ANP(f, g): + """Unify and return ``DMP`` instances of ``f`` and ``g``. """ + if not isinstance(g, ANP) or f._mod != g._mod: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + # The domain is almost always QQ but there are some tests involving ZZ + if f.dom != g.dom: + dom = f.dom.unify(g.dom) + f = f.convert(dom) + g = g.convert(dom) + + return f._rep, g._rep, f._mod, f.dom + + @classmethod + def zero(cls, mod, dom): + return ANP(0, mod, dom) + + @classmethod + def one(cls, mod, dom): + return ANP(1, mod, dom) + + def to_dict(f): + """Convert ``f`` to a dict representation with native coefficients. """ + return f._rep.to_dict() + + def to_sympy_dict(f): + """Convert ``f`` to a dict representation with SymPy coefficients. """ + rep = dmp_to_dict(f.rep, 0, f.dom) + + for k, v in rep.items(): + rep[k] = f.dom.to_sympy(v) + + return rep + + def to_list(f): + """Convert ``f`` to a list representation with native coefficients. """ + return f._rep.to_list() + + def mod_to_list(f): + """Return ``f.mod`` as a list with native coefficients. """ + return f._mod.to_list() + + def to_sympy_list(f): + """Convert ``f`` to a list representation with SymPy coefficients. """ + return [ f.dom.to_sympy(c) for c in f.to_list() ] + + def to_tuple(f): + """ + Convert ``f`` to a tuple representation with native coefficients. + + This is needed for hashing. + """ + return f._rep.to_tuple() + + @classmethod + def from_list(cls, rep, mod, dom): + return ANP(dup_strip(list(map(dom.convert, rep))), mod, dom) + + def add_ground(f, c): + """Add an element of the ground domain to ``f``. """ + return f.per(f._rep.add_ground(c)) + + def sub_ground(f, c): + """Subtract an element of the ground domain from ``f``. """ + return f.per(f._rep.sub_ground(c)) + + def mul_ground(f, c): + """Multiply ``f`` by an element of the ground domain. """ + return f.per(f._rep.mul_ground(c)) + + def quo_ground(f, c): + """Quotient of ``f`` by an element of the ground domain. """ + return f.per(f._rep.quo_ground(c)) + + def neg(f): + return f.per(f._rep.neg()) + + def add(f, g): + F, G, mod, dom = f.unify_ANP(g) + return f.new(F.add(G), mod, dom) + + def sub(f, g): + F, G, mod, dom = f.unify_ANP(g) + return f.new(F.sub(G), mod, dom) + + def mul(f, g): + F, G, mod, dom = f.unify_ANP(g) + return f.new(F.mul(G).rem(mod), mod, dom) + + def pow(f, n): + """Raise ``f`` to a non-negative power ``n``. """ + if not isinstance(n, int): + raise TypeError("``int`` expected, got %s" % type(n)) + + mod = f._mod + F = f._rep + + if n < 0: + F, n = F.invert(mod), -n + + # XXX: Need a pow_mod method for DMP + return f.new(F.pow(n).rem(f._mod), mod, f.dom) + + def exquo(f, g): + F, G, mod, dom = f.unify_ANP(g) + return f.new(F.mul(G.invert(mod)).rem(mod), mod, dom) + + def div(f, g): + return f.exquo(g), f.zero(f._mod, f.dom) + + def quo(f, g): + return f.exquo(g) + + def rem(f, g): + F, G, mod, dom = f.unify_ANP(g) + s, h = F.half_gcdex(G) + + if h.is_one: + return f.zero(mod, dom) + else: + raise NotInvertible("zero divisor") + + def LC(f): + """Returns the leading coefficient of ``f``. """ + return f._rep.LC() + + def TC(f): + """Returns the trailing coefficient of ``f``. """ + return f._rep.TC() + + @property + def is_zero(f): + """Returns ``True`` if ``f`` is a zero algebraic number. """ + return f._rep.is_zero + + @property + def is_one(f): + """Returns ``True`` if ``f`` is a unit algebraic number. """ + return f._rep.is_one + + @property + def is_ground(f): + """Returns ``True`` if ``f`` is an element of the ground domain. """ + return f._rep.is_ground + + def __pos__(f): + return f + + def __neg__(f): + return f.neg() + + def __add__(f, g): + if isinstance(g, ANP): + return f.add(g) + try: + g = f.dom.convert(g) + except CoercionFailed: + return NotImplemented + else: + return f.add_ground(g) + + def __radd__(f, g): + return f.__add__(g) + + def __sub__(f, g): + if isinstance(g, ANP): + return f.sub(g) + try: + g = f.dom.convert(g) + except CoercionFailed: + return NotImplemented + else: + return f.sub_ground(g) + + def __rsub__(f, g): + return (-f).__add__(g) + + def __mul__(f, g): + if isinstance(g, ANP): + return f.mul(g) + try: + g = f.dom.convert(g) + except CoercionFailed: + return NotImplemented + else: + return f.mul_ground(g) + + def __rmul__(f, g): + return f.__mul__(g) + + def __pow__(f, n): + return f.pow(n) + + def __divmod__(f, g): + return f.div(g) + + def __mod__(f, g): + return f.rem(g) + + def __truediv__(f, g): + if isinstance(g, ANP): + return f.quo(g) + try: + g = f.dom.convert(g) + except CoercionFailed: + return NotImplemented + else: + return f.quo_ground(g) + + def __eq__(f, g): + try: + F, G, _, _ = f.unify_ANP(g) + except UnificationFailed: + return NotImplemented + return F == G + + def __ne__(f, g): + try: + F, G, _, _ = f.unify_ANP(g) + except UnificationFailed: + return NotImplemented + return F != G + + def __lt__(f, g): + F, G, _, _ = f.unify_ANP(g) + return F < G + + def __le__(f, g): + F, G, _, _ = f.unify_ANP(g) + return F <= G + + def __gt__(f, g): + F, G, _, _ = f.unify_ANP(g) + return F > G + + def __ge__(f, g): + F, G, _, _ = f.unify_ANP(g) + return F >= G + + def __bool__(f): + return bool(f._rep) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyconfig.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyconfig.py new file mode 100644 index 0000000000000000000000000000000000000000..75731f7ac4e4f8784ff8f999cc3537bfa3c6659a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyconfig.py @@ -0,0 +1,67 @@ +"""Configuration utilities for polynomial manipulation algorithms. """ + + +from contextlib import contextmanager + +_default_config = { + 'USE_COLLINS_RESULTANT': False, + 'USE_SIMPLIFY_GCD': True, + 'USE_HEU_GCD': True, + + 'USE_IRREDUCIBLE_IN_FACTOR': False, + 'USE_CYCLOTOMIC_FACTOR': True, + + 'EEZ_RESTART_IF_NEEDED': True, + 'EEZ_NUMBER_OF_CONFIGS': 3, + 'EEZ_NUMBER_OF_TRIES': 5, + 'EEZ_MODULUS_STEP': 2, + + 'GF_IRRED_METHOD': 'rabin', + 'GF_FACTOR_METHOD': 'zassenhaus', + + 'GROEBNER': 'buchberger', +} + +_current_config = {} + +@contextmanager +def using(**kwargs): + for k, v in kwargs.items(): + setup(k, v) + + yield + + for k in kwargs.keys(): + setup(k) + +def setup(key, value=None): + """Assign a value to (or reset) a configuration item. """ + key = key.upper() + + if value is not None: + _current_config[key] = value + else: + _current_config[key] = _default_config[key] + + +def query(key): + """Ask for a value of the given configuration item. """ + return _current_config.get(key.upper(), None) + + +def configure(): + """Initialized configuration of polys module. """ + from os import getenv + + for key, default in _default_config.items(): + value = getenv('SYMPY_' + key) + + if value is not None: + try: + _current_config[key] = eval(value) + except NameError: + _current_config[key] = value + else: + _current_config[key] = default + +configure() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyerrors.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyerrors.py new file mode 100644 index 0000000000000000000000000000000000000000..79385ffaf6746386f8f108c3e02992dcaf4a4f55 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyerrors.py @@ -0,0 +1,183 @@ +"""Definitions of common exceptions for `polys` module. """ + + +from sympy.utilities import public + +@public +class BasePolynomialError(Exception): + """Base class for polynomial related exceptions. """ + + def new(self, *args): + raise NotImplementedError("abstract base class") + +@public +class ExactQuotientFailed(BasePolynomialError): + + def __init__(self, f, g, dom=None): + self.f, self.g, self.dom = f, g, dom + + def __str__(self): # pragma: no cover + from sympy.printing.str import sstr + + if self.dom is None: + return "%s does not divide %s" % (sstr(self.g), sstr(self.f)) + else: + return "%s does not divide %s in %s" % (sstr(self.g), sstr(self.f), sstr(self.dom)) + + def new(self, f, g): + return self.__class__(f, g, self.dom) + +@public +class PolynomialDivisionFailed(BasePolynomialError): + + def __init__(self, f, g, domain): + self.f = f + self.g = g + self.domain = domain + + def __str__(self): + if self.domain.is_EX: + msg = "You may want to use a different simplification algorithm. Note " \ + "that in general it's not possible to guarantee to detect zero " \ + "in this domain." + elif not self.domain.is_Exact: + msg = "Your working precision or tolerance of computations may be set " \ + "improperly. Adjust those parameters of the coefficient domain " \ + "and try again." + else: + msg = "Zero detection is guaranteed in this coefficient domain. This " \ + "may indicate a bug in SymPy or the domain is user defined and " \ + "doesn't implement zero detection properly." + + return "couldn't reduce degree in a polynomial division algorithm when " \ + "dividing %s by %s. This can happen when it's not possible to " \ + "detect zero in the coefficient domain. The domain of computation " \ + "is %s. %s" % (self.f, self.g, self.domain, msg) + +@public +class OperationNotSupported(BasePolynomialError): + + def __init__(self, poly, func): + self.poly = poly + self.func = func + + def __str__(self): # pragma: no cover + return "`%s` operation not supported by %s representation" % (self.func, self.poly.rep.__class__.__name__) + +@public +class HeuristicGCDFailed(BasePolynomialError): + pass + +class ModularGCDFailed(BasePolynomialError): + pass + +@public +class HomomorphismFailed(BasePolynomialError): + pass + +@public +class IsomorphismFailed(BasePolynomialError): + pass + +@public +class ExtraneousFactors(BasePolynomialError): + pass + +@public +class EvaluationFailed(BasePolynomialError): + pass + +@public +class RefinementFailed(BasePolynomialError): + pass + +@public +class CoercionFailed(BasePolynomialError): + pass + +@public +class NotInvertible(BasePolynomialError): + pass + +@public +class NotReversible(BasePolynomialError): + pass + +@public +class NotAlgebraic(BasePolynomialError): + pass + +@public +class DomainError(BasePolynomialError): + pass + +@public +class PolynomialError(BasePolynomialError): + pass + +@public +class UnificationFailed(BasePolynomialError): + pass + +@public +class UnsolvableFactorError(BasePolynomialError): + """Raised if ``roots`` is called with strict=True and a polynomial + having a factor whose solutions are not expressible in radicals + is encountered.""" + +@public +class GeneratorsError(BasePolynomialError): + pass + +@public +class GeneratorsNeeded(GeneratorsError): + pass + +@public +class ComputationFailed(BasePolynomialError): + + def __init__(self, func, nargs, exc): + self.func = func + self.nargs = nargs + self.exc = exc + + def __str__(self): + return "%s(%s) failed without generators" % (self.func, ', '.join(map(str, self.exc.exprs[:self.nargs]))) + +@public +class UnivariatePolynomialError(PolynomialError): + pass + +@public +class MultivariatePolynomialError(PolynomialError): + pass + +@public +class PolificationFailed(PolynomialError): + + def __init__(self, opt, origs, exprs, seq=False): + if not seq: + self.orig = origs + self.expr = exprs + self.origs = [origs] + self.exprs = [exprs] + else: + self.origs = origs + self.exprs = exprs + + self.opt = opt + self.seq = seq + + def __str__(self): # pragma: no cover + if not self.seq: + return "Cannot construct a polynomial from %s" % str(self.orig) + else: + return "Cannot construct polynomials from %s" % ', '.join(map(str, self.origs)) + +@public +class OptionError(BasePolynomialError): + pass + +@public +class FlagError(OptionError): + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyfuncs.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyfuncs.py new file mode 100644 index 0000000000000000000000000000000000000000..b412123f7383c68177a88df8817e921d96f6d5af --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyfuncs.py @@ -0,0 +1,321 @@ +"""High-level polynomials manipulation functions. """ + + +from sympy.core import S, Basic, symbols, Dummy +from sympy.polys.polyerrors import ( + PolificationFailed, ComputationFailed, + MultivariatePolynomialError, OptionError) +from sympy.polys.polyoptions import allowed_flags, build_options +from sympy.polys.polytools import poly_from_expr, Poly +from sympy.polys.specialpolys import ( + symmetric_poly, interpolating_poly) +from sympy.polys.rings import sring +from sympy.utilities import numbered_symbols, take, public + +@public +def symmetrize(F, *gens, **args): + r""" + Rewrite a polynomial in terms of elementary symmetric polynomials. + + A symmetric polynomial is a multivariate polynomial that remains invariant + under any variable permutation, i.e., if `f = f(x_1, x_2, \dots, x_n)`, + then `f = f(x_{i_1}, x_{i_2}, \dots, x_{i_n})`, where + `(i_1, i_2, \dots, i_n)` is a permutation of `(1, 2, \dots, n)` (an + element of the group `S_n`). + + Returns a tuple of symmetric polynomials ``(f1, f2, ..., fn)`` such that + ``f = f1 + f2 + ... + fn``. + + Examples + ======== + + >>> from sympy.polys.polyfuncs import symmetrize + >>> from sympy.abc import x, y + + >>> symmetrize(x**2 + y**2) + (-2*x*y + (x + y)**2, 0) + + >>> symmetrize(x**2 + y**2, formal=True) + (s1**2 - 2*s2, 0, [(s1, x + y), (s2, x*y)]) + + >>> symmetrize(x**2 - y**2) + (-2*x*y + (x + y)**2, -2*y**2) + + >>> symmetrize(x**2 - y**2, formal=True) + (s1**2 - 2*s2, -2*y**2, [(s1, x + y), (s2, x*y)]) + + """ + allowed_flags(args, ['formal', 'symbols']) + + iterable = True + + if not hasattr(F, '__iter__'): + iterable = False + F = [F] + + R, F = sring(F, *gens, **args) + gens = R.symbols + + opt = build_options(gens, args) + symbols = opt.symbols + symbols = [next(symbols) for i in range(len(gens))] + + result = [] + + for f in F: + p, r, m = f.symmetrize() + result.append((p.as_expr(*symbols), r.as_expr(*gens))) + + polys = [(s, g.as_expr()) for s, (_, g) in zip(symbols, m)] + + if not opt.formal: + for i, (sym, non_sym) in enumerate(result): + result[i] = (sym.subs(polys), non_sym) + + if not iterable: + result, = result + + if not opt.formal: + return result + else: + if iterable: + return result, polys + else: + return result + (polys,) + + +@public +def horner(f, *gens, **args): + """ + Rewrite a polynomial in Horner form. + + Among other applications, evaluation of a polynomial at a point is optimal + when it is applied using the Horner scheme ([1]). + + Examples + ======== + + >>> from sympy.polys.polyfuncs import horner + >>> from sympy.abc import x, y, a, b, c, d, e + + >>> horner(9*x**4 + 8*x**3 + 7*x**2 + 6*x + 5) + x*(x*(x*(9*x + 8) + 7) + 6) + 5 + + >>> horner(a*x**4 + b*x**3 + c*x**2 + d*x + e) + e + x*(d + x*(c + x*(a*x + b))) + + >>> f = 4*x**2*y**2 + 2*x**2*y + 2*x*y**2 + x*y + + >>> horner(f, wrt=x) + x*(x*y*(4*y + 2) + y*(2*y + 1)) + + >>> horner(f, wrt=y) + y*(x*y*(4*x + 2) + x*(2*x + 1)) + + References + ========== + [1] - https://en.wikipedia.org/wiki/Horner_scheme + + """ + allowed_flags(args, []) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + return exc.expr + + form, gen = S.Zero, F.gen + + if F.is_univariate: + for coeff in F.all_coeffs(): + form = form*gen + coeff + else: + F, gens = Poly(F, gen), gens[1:] + + for coeff in F.all_coeffs(): + form = form*gen + horner(coeff, *gens, **args) + + return form + + +@public +def interpolate(data, x): + """ + Construct an interpolating polynomial for the data points + evaluated at point x (which can be symbolic or numeric). + + Examples + ======== + + >>> from sympy.polys.polyfuncs import interpolate + >>> from sympy.abc import a, b, x + + A list is interpreted as though it were paired with a range starting + from 1: + + >>> interpolate([1, 4, 9, 16], x) + x**2 + + This can be made explicit by giving a list of coordinates: + + >>> interpolate([(1, 1), (2, 4), (3, 9)], x) + x**2 + + The (x, y) coordinates can also be given as keys and values of a + dictionary (and the points need not be equispaced): + + >>> interpolate([(-1, 2), (1, 2), (2, 5)], x) + x**2 + 1 + >>> interpolate({-1: 2, 1: 2, 2: 5}, x) + x**2 + 1 + + If the interpolation is going to be used only once then the + value of interest can be passed instead of passing a symbol: + + >>> interpolate([1, 4, 9], 5) + 25 + + Symbolic coordinates are also supported: + + >>> [(i,interpolate((a, b), i)) for i in range(1, 4)] + [(1, a), (2, b), (3, -a + 2*b)] + """ + n = len(data) + + if isinstance(data, dict): + if x in data: + return S(data[x]) + X, Y = list(zip(*data.items())) + else: + if isinstance(data[0], tuple): + X, Y = list(zip(*data)) + if x in X: + return S(Y[X.index(x)]) + else: + if x in range(1, n + 1): + return S(data[x - 1]) + Y = list(data) + X = list(range(1, n + 1)) + + try: + return interpolating_poly(n, x, X, Y).expand() + except ValueError: + d = Dummy() + return interpolating_poly(n, d, X, Y).expand().subs(d, x) + + +@public +def rational_interpolate(data, degnum, X=symbols('x')): + """ + Returns a rational interpolation, where the data points are element of + any integral domain. + + The first argument contains the data (as a list of coordinates). The + ``degnum`` argument is the degree in the numerator of the rational + function. Setting it too high will decrease the maximal degree in the + denominator for the same amount of data. + + Examples + ======== + + >>> from sympy.polys.polyfuncs import rational_interpolate + + >>> data = [(1, -210), (2, -35), (3, 105), (4, 231), (5, 350), (6, 465)] + >>> rational_interpolate(data, 2) + (105*x**2 - 525)/(x + 1) + + Values do not need to be integers: + + >>> from sympy import sympify + >>> x = [1, 2, 3, 4, 5, 6] + >>> y = sympify("[-1, 0, 2, 22/5, 7, 68/7]") + >>> rational_interpolate(zip(x, y), 2) + (3*x**2 - 7*x + 2)/(x + 1) + + The symbol for the variable can be changed if needed: + >>> from sympy import symbols + >>> z = symbols('z') + >>> rational_interpolate(data, 2, X=z) + (105*z**2 - 525)/(z + 1) + + References + ========== + + .. [1] Algorithm is adapted from: + http://axiom-wiki.newsynthesis.org/RationalInterpolation + + """ + from sympy.matrices.dense import ones + + xdata, ydata = list(zip(*data)) + + k = len(xdata) - degnum - 1 + if k < 0: + raise OptionError("Too few values for the required degree.") + c = ones(degnum + k + 1, degnum + k + 2) + for j in range(max(degnum, k)): + for i in range(degnum + k + 1): + c[i, j + 1] = c[i, j]*xdata[i] + for j in range(k + 1): + for i in range(degnum + k + 1): + c[i, degnum + k + 1 - j] = -c[i, k - j]*ydata[i] + r = c.nullspace()[0] + return (sum(r[i] * X**i for i in range(degnum + 1)) + / sum(r[i + degnum + 1] * X**i for i in range(k + 1))) + + +@public +def viete(f, roots=None, *gens, **args): + """ + Generate Viete's formulas for ``f``. + + Examples + ======== + + >>> from sympy.polys.polyfuncs import viete + >>> from sympy import symbols + + >>> x, a, b, c, r1, r2 = symbols('x,a:c,r1:3') + + >>> viete(a*x**2 + b*x + c, [r1, r2], x) + [(r1 + r2, -b/a), (r1*r2, c/a)] + + """ + allowed_flags(args, []) + + if isinstance(roots, Basic): + gens, roots = (roots,) + gens, None + + try: + f, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('viete', 1, exc) + + if f.is_multivariate: + raise MultivariatePolynomialError( + "multivariate polynomials are not allowed") + + n = f.degree() + + if n < 1: + raise ValueError( + "Cannot derive Viete's formulas for a constant polynomial") + + if roots is None: + roots = numbered_symbols('r', start=1) + + roots = take(roots, n) + + if n != len(roots): + raise ValueError("required %s roots, got %s" % (n, len(roots))) + + lc, coeffs = f.LC(), f.all_coeffs() + result, sign = [], -1 + + for i, coeff in enumerate(coeffs[1:]): + poly = symmetric_poly(i + 1, roots) + coeff = sign*(coeff/lc) + result.append((poly, coeff)) + sign = -sign + + return result diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polymatrix.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polymatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..fb2a58efc3ebfd85507ac2b0cfd31230e55ded66 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polymatrix.py @@ -0,0 +1,292 @@ +from sympy.core.expr import Expr +from sympy.core.symbol import Dummy +from sympy.core.sympify import _sympify + +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.polytools import Poly, parallel_poly_from_expr +from sympy.polys.domains import QQ + +from sympy.polys.matrices import DomainMatrix +from sympy.polys.matrices.domainscalar import DomainScalar + + +class MutablePolyDenseMatrix: + """ + A mutable matrix of objects from poly module or to operate with them. + + Examples + ======== + + >>> from sympy.polys.polymatrix import PolyMatrix + >>> from sympy import Symbol, Poly + >>> x = Symbol('x') + >>> pm1 = PolyMatrix([[Poly(x**2, x), Poly(-x, x)], [Poly(x**3, x), Poly(-1 + x, x)]]) + >>> v1 = PolyMatrix([[1, 0], [-1, 0]], x) + >>> pm1*v1 + PolyMatrix([ + [ x**2 + x, 0], + [x**3 - x + 1, 0]], ring=QQ[x]) + + >>> pm1.ring + ZZ[x] + + >>> v1*pm1 + PolyMatrix([ + [ x**2, -x], + [-x**2, x]], ring=QQ[x]) + + >>> pm2 = PolyMatrix([[Poly(x**2, x, domain='QQ'), Poly(0, x, domain='QQ'), Poly(1, x, domain='QQ'), \ + Poly(x**3, x, domain='QQ'), Poly(0, x, domain='QQ'), Poly(-x**3, x, domain='QQ')]]) + >>> v2 = PolyMatrix([1, 0, 0, 0, 0, 0], x) + >>> v2.ring + QQ[x] + >>> pm2*v2 + PolyMatrix([[x**2]], ring=QQ[x]) + + """ + + def __new__(cls, *args, ring=None): + + if not args: + # PolyMatrix(ring=QQ[x]) + if ring is None: + raise TypeError("The ring needs to be specified for an empty PolyMatrix") + rows, cols, items, gens = 0, 0, [], () + elif isinstance(args[0], list): + elements, gens = args[0], args[1:] + if not elements: + # PolyMatrix([]) + rows, cols, items = 0, 0, [] + elif isinstance(elements[0], (list, tuple)): + # PolyMatrix([[1, 2]], x) + rows, cols = len(elements), len(elements[0]) + items = [e for row in elements for e in row] + else: + # PolyMatrix([1, 2], x) + rows, cols = len(elements), 1 + items = elements + elif [type(a) for a in args[:3]] == [int, int, list]: + # PolyMatrix(2, 2, [1, 2, 3, 4], x) + rows, cols, items, gens = args[0], args[1], args[2], args[3:] + elif [type(a) for a in args[:3]] == [int, int, type(lambda: 0)]: + # PolyMatrix(2, 2, lambda i, j: i+j, x) + rows, cols, func, gens = args[0], args[1], args[2], args[3:] + items = [func(i, j) for i in range(rows) for j in range(cols)] + else: + raise TypeError("Invalid arguments") + + # PolyMatrix([[1]], x, y) vs PolyMatrix([[1]], (x, y)) + if len(gens) == 1 and isinstance(gens[0], tuple): + gens = gens[0] + # gens is now a tuple (x, y) + + return cls.from_list(rows, cols, items, gens, ring) + + @classmethod + def from_list(cls, rows, cols, items, gens, ring): + + # items can be Expr, Poly, or a mix of Expr and Poly + items = [_sympify(item) for item in items] + if items and all(isinstance(item, Poly) for item in items): + polys = True + else: + polys = False + + # Identify the ring for the polys + if ring is not None: + # Parse a domain string like 'QQ[x]' + if isinstance(ring, str): + ring = Poly(0, Dummy(), domain=ring).domain + elif polys: + p = items[0] + for p2 in items[1:]: + p, _ = p.unify(p2) + ring = p.domain[p.gens] + else: + items, info = parallel_poly_from_expr(items, gens, field=True) + ring = info['domain'][info['gens']] + polys = True + + # Efficiently convert when all elements are Poly + if polys: + p_ring = Poly(0, ring.symbols, domain=ring.domain) + to_ring = ring.ring.from_list + convert_poly = lambda p: to_ring(p.unify(p_ring)[0].rep.to_list()) + elements = [convert_poly(p) for p in items] + else: + convert_expr = ring.from_sympy + elements = [convert_expr(e.as_expr()) for e in items] + + # Convert to domain elements and construct DomainMatrix + elements_lol = [[elements[i*cols + j] for j in range(cols)] for i in range(rows)] + dm = DomainMatrix(elements_lol, (rows, cols), ring) + return cls.from_dm(dm) + + @classmethod + def from_dm(cls, dm): + obj = super().__new__(cls) + dm = dm.to_sparse() + R = dm.domain + obj._dm = dm + obj.ring = R + obj.domain = R.domain + obj.gens = R.symbols + return obj + + def to_Matrix(self): + return self._dm.to_Matrix() + + @classmethod + def from_Matrix(cls, other, *gens, ring=None): + return cls(*other.shape, other.flat(), *gens, ring=ring) + + def set_gens(self, gens): + return self.from_Matrix(self.to_Matrix(), gens) + + def __repr__(self): + if self.rows * self.cols: + return 'Poly' + repr(self.to_Matrix())[:-1] + f', ring={self.ring})' + else: + return f'PolyMatrix({self.rows}, {self.cols}, [], ring={self.ring})' + + @property + def shape(self): + return self._dm.shape + + @property + def rows(self): + return self.shape[0] + + @property + def cols(self): + return self.shape[1] + + def __len__(self): + return self.rows * self.cols + + def __getitem__(self, key): + + def to_poly(v): + ground = self._dm.domain.domain + gens = self._dm.domain.symbols + return Poly(v.to_dict(), gens, domain=ground) + + dm = self._dm + + if isinstance(key, slice): + items = dm.flat()[key] + return [to_poly(item) for item in items] + elif isinstance(key, int): + i, j = divmod(key, self.cols) + e = dm[i,j] + return to_poly(e.element) + + i, j = key + if isinstance(i, int) and isinstance(j, int): + return to_poly(dm[i, j].element) + else: + return self.from_dm(dm[i, j]) + + def __eq__(self, other): + if not isinstance(self, type(other)): + return NotImplemented + return self._dm == other._dm + + def __add__(self, other): + if isinstance(other, type(self)): + return self.from_dm(self._dm + other._dm) + return NotImplemented + + def __sub__(self, other): + if isinstance(other, type(self)): + return self.from_dm(self._dm - other._dm) + return NotImplemented + + def __mul__(self, other): + if isinstance(other, type(self)): + return self.from_dm(self._dm * other._dm) + elif isinstance(other, int): + other = _sympify(other) + if isinstance(other, Expr): + Kx = self.ring + try: + other_ds = DomainScalar(Kx.from_sympy(other), Kx) + except (CoercionFailed, ValueError): + other_ds = DomainScalar.from_sympy(other) + return self.from_dm(self._dm * other_ds) + return NotImplemented + + def __rmul__(self, other): + if isinstance(other, int): + other = _sympify(other) + if isinstance(other, Expr): + other_ds = DomainScalar.from_sympy(other) + return self.from_dm(other_ds * self._dm) + return NotImplemented + + def __truediv__(self, other): + + if isinstance(other, Poly): + other = other.as_expr() + elif isinstance(other, int): + other = _sympify(other) + if not isinstance(other, Expr): + return NotImplemented + + other = self.domain.from_sympy(other) + inverse = self.ring.convert_from(1/other, self.domain) + inverse = DomainScalar(inverse, self.ring) + dm = self._dm * inverse + return self.from_dm(dm) + + def __neg__(self): + return self.from_dm(-self._dm) + + def transpose(self): + return self.from_dm(self._dm.transpose()) + + def row_join(self, other): + dm = DomainMatrix.hstack(self._dm, other._dm) + return self.from_dm(dm) + + def col_join(self, other): + dm = DomainMatrix.vstack(self._dm, other._dm) + return self.from_dm(dm) + + def applyfunc(self, func): + M = self.to_Matrix().applyfunc(func) + return self.from_Matrix(M, self.gens) + + @classmethod + def eye(cls, n, gens): + return cls.from_dm(DomainMatrix.eye(n, QQ[gens])) + + @classmethod + def zeros(cls, m, n, gens): + return cls.from_dm(DomainMatrix.zeros((m, n), QQ[gens])) + + def rref(self, simplify='ignore', normalize_last='ignore'): + # If this is K[x] then computes RREF in ground field K. + if not (self.domain.is_Field and all(p.is_ground for p in self)): + raise ValueError("PolyMatrix rref is only for ground field elements") + dm = self._dm + dm_ground = dm.convert_to(dm.domain.domain) + dm_rref, pivots = dm_ground.rref() + dm_rref = dm_rref.convert_to(dm.domain) + return self.from_dm(dm_rref), pivots + + def nullspace(self): + # If this is K[x] then computes nullspace in ground field K. + if not (self.domain.is_Field and all(p.is_ground for p in self)): + raise ValueError("PolyMatrix nullspace is only for ground field elements") + dm = self._dm + K, Kx = self.domain, self.ring + dm_null_rows = dm.convert_to(K).nullspace(divide_last=True).convert_to(Kx) + dm_null = dm_null_rows.transpose() + dm_basis = [dm_null[:,i] for i in range(dm_null.shape[1])] + return [self.from_dm(dmvec) for dmvec in dm_basis] + + def rank(self): + return self.cols - len(self.nullspace()) + +MutablePolyMatrix = PolyMatrix = MutablePolyDenseMatrix diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyoptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyoptions.py new file mode 100644 index 0000000000000000000000000000000000000000..7b9bd989c4d5676aab32e65c62996137b3e0b73e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyoptions.py @@ -0,0 +1,791 @@ +"""Options manager for :class:`~.Poly` and public API functions. """ + +from __future__ import annotations + +__all__ = ["Options"] + +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.sympify import sympify +from sympy.polys.polyerrors import GeneratorsError, OptionError, FlagError +from sympy.utilities import numbered_symbols, topological_sort, public +from sympy.utilities.iterables import has_dups, is_sequence + +import sympy.polys + +import re + +class Option: + """Base class for all kinds of options. """ + + option: str | None = None + + is_Flag = False + + requires: list[str] = [] + excludes: list[str] = [] + + after: list[str] = [] + before: list[str] = [] + + @classmethod + def default(cls): + return None + + @classmethod + def preprocess(cls, option): + return None + + @classmethod + def postprocess(cls, options): + pass + + +class Flag(Option): + """Base class for all kinds of flags. """ + + is_Flag = True + + +class BooleanOption(Option): + """An option that must have a boolean value or equivalent assigned. """ + + @classmethod + def preprocess(cls, value): + if value in [True, False]: + return bool(value) + else: + raise OptionError("'%s' must have a boolean value assigned, got %s" % (cls.option, value)) + + +class OptionType(type): + """Base type for all options that does registers options. """ + + def __init__(cls, *args, **kwargs): + @property + def getter(self): + try: + return self[cls.option] + except KeyError: + return cls.default() + + setattr(Options, cls.option, getter) + Options.__options__[cls.option] = cls + + +@public +class Options(dict): + """ + Options manager for polynomial manipulation module. + + Examples + ======== + + >>> from sympy.polys.polyoptions import Options + >>> from sympy.polys.polyoptions import build_options + + >>> from sympy.abc import x, y, z + + >>> Options((x, y, z), {'domain': 'ZZ'}) + {'auto': False, 'domain': ZZ, 'gens': (x, y, z)} + + >>> build_options((x, y, z), {'domain': 'ZZ'}) + {'auto': False, 'domain': ZZ, 'gens': (x, y, z)} + + **Options** + + * Expand --- boolean option + * Gens --- option + * Wrt --- option + * Sort --- option + * Order --- option + * Field --- boolean option + * Greedy --- boolean option + * Domain --- option + * Split --- boolean option + * Gaussian --- boolean option + * Extension --- option + * Modulus --- option + * Symmetric --- boolean option + * Strict --- boolean option + + **Flags** + + * Auto --- boolean flag + * Frac --- boolean flag + * Formal --- boolean flag + * Polys --- boolean flag + * Include --- boolean flag + * All --- boolean flag + * Gen --- flag + * Series --- boolean flag + + """ + + __order__ = None + __options__: dict[str, type[Option]] = {} + + gens: tuple[Expr, ...] + domain: sympy.polys.domains.Domain + + def __init__(self, gens, args, flags=None, strict=False): + dict.__init__(self) + + if gens and args.get('gens', ()): + raise OptionError( + "both '*gens' and keyword argument 'gens' supplied") + elif gens: + args = dict(args) + args['gens'] = gens + + defaults = args.pop('defaults', {}) + + def preprocess_options(args): + for option, value in args.items(): + try: + cls = self.__options__[option] + except KeyError: + raise OptionError("'%s' is not a valid option" % option) + + if issubclass(cls, Flag): + if flags is None or option not in flags: + if strict: + raise OptionError("'%s' flag is not allowed in this context" % option) + + if value is not None: + self[option] = cls.preprocess(value) + + preprocess_options(args) + + for key in dict(defaults): + if key in self: + del defaults[key] + else: + for option in self.keys(): + cls = self.__options__[option] + + if key in cls.excludes: + del defaults[key] + break + + preprocess_options(defaults) + + for option in self.keys(): + cls = self.__options__[option] + + for require_option in cls.requires: + if self.get(require_option) is None: + raise OptionError("'%s' option is only allowed together with '%s'" % (option, require_option)) + + for exclude_option in cls.excludes: + if self.get(exclude_option) is not None: + raise OptionError("'%s' option is not allowed together with '%s'" % (option, exclude_option)) + + for option in self.__order__: + self.__options__[option].postprocess(self) + + @classmethod + def _init_dependencies_order(cls): + """Resolve the order of options' processing. """ + if cls.__order__ is None: + vertices, edges = [], set() + + for name, option in cls.__options__.items(): + vertices.append(name) + + edges.update((_name, name) for _name in option.after) + + edges.update((name, _name) for _name in option.before) + + try: + cls.__order__ = topological_sort((vertices, list(edges))) + except ValueError: + raise RuntimeError( + "cycle detected in sympy.polys options framework") + + def clone(self, updates={}): + """Clone ``self`` and update specified options. """ + obj = dict.__new__(self.__class__) + + for option, value in self.items(): + obj[option] = value + + for option, value in updates.items(): + obj[option] = value + + return obj + + def __setattr__(self, attr, value): + if attr in self.__options__: + self[attr] = value + else: + super().__setattr__(attr, value) + + @property + def args(self): + args = {} + + for option, value in self.items(): + if value is not None and option != 'gens': + cls = self.__options__[option] + + if not issubclass(cls, Flag): + args[option] = value + + return args + + @property + def options(self): + options = {} + + for option, cls in self.__options__.items(): + if not issubclass(cls, Flag): + options[option] = getattr(self, option) + + return options + + @property + def flags(self): + flags = {} + + for option, cls in self.__options__.items(): + if issubclass(cls, Flag): + flags[option] = getattr(self, option) + + return flags + + +class Expand(BooleanOption, metaclass=OptionType): + """``expand`` option to polynomial manipulation functions. """ + + option = 'expand' + + requires: list[str] = [] + excludes: list[str] = [] + + @classmethod + def default(cls): + return True + + +class Gens(Option, metaclass=OptionType): + """``gens`` option to polynomial manipulation functions. """ + + option = 'gens' + + requires: list[str] = [] + excludes: list[str] = [] + + @classmethod + def default(cls): + return () + + @classmethod + def preprocess(cls, gens): + if isinstance(gens, Basic): + gens = (gens,) + elif len(gens) == 1 and is_sequence(gens[0]): + gens = gens[0] + + if gens == (None,): + gens = () + elif has_dups(gens): + raise GeneratorsError("duplicated generators: %s" % str(gens)) + elif any(gen.is_commutative is False for gen in gens): + raise GeneratorsError("non-commutative generators: %s" % str(gens)) + + return tuple(gens) + + +class Wrt(Option, metaclass=OptionType): + """``wrt`` option to polynomial manipulation functions. """ + + option = 'wrt' + + requires: list[str] = [] + excludes: list[str] = [] + + _re_split = re.compile(r"\s*,\s*|\s+") + + @classmethod + def preprocess(cls, wrt): + if isinstance(wrt, Basic): + return [str(wrt)] + elif isinstance(wrt, str): + wrt = wrt.strip() + if wrt.endswith(','): + raise OptionError('Bad input: missing parameter.') + if not wrt: + return [] + return list(cls._re_split.split(wrt)) + elif hasattr(wrt, '__getitem__'): + return list(map(str, wrt)) + else: + raise OptionError("invalid argument for 'wrt' option") + + +class Sort(Option, metaclass=OptionType): + """``sort`` option to polynomial manipulation functions. """ + + option = 'sort' + + requires: list[str] = [] + excludes: list[str] = [] + + @classmethod + def default(cls): + return [] + + @classmethod + def preprocess(cls, sort): + if isinstance(sort, str): + return [ gen.strip() for gen in sort.split('>') ] + elif hasattr(sort, '__getitem__'): + return list(map(str, sort)) + else: + raise OptionError("invalid argument for 'sort' option") + + +class Order(Option, metaclass=OptionType): + """``order`` option to polynomial manipulation functions. """ + + option = 'order' + + requires: list[str] = [] + excludes: list[str] = [] + + @classmethod + def default(cls): + return sympy.polys.orderings.lex + + @classmethod + def preprocess(cls, order): + return sympy.polys.orderings.monomial_key(order) + + +class Field(BooleanOption, metaclass=OptionType): + """``field`` option to polynomial manipulation functions. """ + + option = 'field' + + requires: list[str] = [] + excludes = ['domain', 'split', 'gaussian'] + + +class Greedy(BooleanOption, metaclass=OptionType): + """``greedy`` option to polynomial manipulation functions. """ + + option = 'greedy' + + requires: list[str] = [] + excludes = ['domain', 'split', 'gaussian', 'extension', 'modulus', 'symmetric'] + + +class Composite(BooleanOption, metaclass=OptionType): + """``composite`` option to polynomial manipulation functions. """ + + option = 'composite' + + @classmethod + def default(cls): + return None + + requires: list[str] = [] + excludes = ['domain', 'split', 'gaussian', 'extension', 'modulus', 'symmetric'] + + +class Domain(Option, metaclass=OptionType): + """``domain`` option to polynomial manipulation functions. """ + + option = 'domain' + + requires: list[str] = [] + excludes = ['field', 'greedy', 'split', 'gaussian', 'extension'] + + after = ['gens'] + + _re_realfield = re.compile(r"^(R|RR)(_(\d+))?$") + _re_complexfield = re.compile(r"^(C|CC)(_(\d+))?$") + _re_finitefield = re.compile(r"^(FF|GF)\((\d+)\)$") + _re_polynomial = re.compile(r"^(Z|ZZ|Q|QQ|ZZ_I|QQ_I|R|RR|C|CC)\[(.+)\]$") + _re_fraction = re.compile(r"^(Z|ZZ|Q|QQ)\((.+)\)$") + _re_algebraic = re.compile(r"^(Q|QQ)\<(.+)\>$") + + @classmethod + def preprocess(cls, domain): + if isinstance(domain, sympy.polys.domains.Domain): + return domain + elif hasattr(domain, 'to_domain'): + return domain.to_domain() + elif isinstance(domain, str): + if domain in ['Z', 'ZZ']: + return sympy.polys.domains.ZZ + + if domain in ['Q', 'QQ']: + return sympy.polys.domains.QQ + + if domain == 'ZZ_I': + return sympy.polys.domains.ZZ_I + + if domain == 'QQ_I': + return sympy.polys.domains.QQ_I + + if domain == 'EX': + return sympy.polys.domains.EX + + r = cls._re_realfield.match(domain) + + if r is not None: + _, _, prec = r.groups() + + if prec is None: + return sympy.polys.domains.RR + else: + return sympy.polys.domains.RealField(int(prec)) + + r = cls._re_complexfield.match(domain) + + if r is not None: + _, _, prec = r.groups() + + if prec is None: + return sympy.polys.domains.CC + else: + return sympy.polys.domains.ComplexField(int(prec)) + + r = cls._re_finitefield.match(domain) + + if r is not None: + return sympy.polys.domains.FF(int(r.groups()[1])) + + r = cls._re_polynomial.match(domain) + + if r is not None: + ground, gens = r.groups() + + gens = list(map(sympify, gens.split(','))) + + if ground in ['Z', 'ZZ']: + return sympy.polys.domains.ZZ.poly_ring(*gens) + elif ground in ['Q', 'QQ']: + return sympy.polys.domains.QQ.poly_ring(*gens) + elif ground in ['R', 'RR']: + return sympy.polys.domains.RR.poly_ring(*gens) + elif ground == 'ZZ_I': + return sympy.polys.domains.ZZ_I.poly_ring(*gens) + elif ground == 'QQ_I': + return sympy.polys.domains.QQ_I.poly_ring(*gens) + else: + return sympy.polys.domains.CC.poly_ring(*gens) + + r = cls._re_fraction.match(domain) + + if r is not None: + ground, gens = r.groups() + + gens = list(map(sympify, gens.split(','))) + + if ground in ['Z', 'ZZ']: + return sympy.polys.domains.ZZ.frac_field(*gens) + else: + return sympy.polys.domains.QQ.frac_field(*gens) + + r = cls._re_algebraic.match(domain) + + if r is not None: + gens = list(map(sympify, r.groups()[1].split(','))) + return sympy.polys.domains.QQ.algebraic_field(*gens) + + raise OptionError('expected a valid domain specification, got %s' % domain) + + @classmethod + def postprocess(cls, options): + if 'gens' in options and 'domain' in options and options['domain'].is_Composite and \ + (set(options['domain'].symbols) & set(options['gens'])): + raise GeneratorsError( + "ground domain and generators interfere together") + elif ('gens' not in options or not options['gens']) and \ + 'domain' in options and options['domain'] == sympy.polys.domains.EX: + raise GeneratorsError("you have to provide generators because EX domain was requested") + + +class Split(BooleanOption, metaclass=OptionType): + """``split`` option to polynomial manipulation functions. """ + + option = 'split' + + requires: list[str] = [] + excludes = ['field', 'greedy', 'domain', 'gaussian', 'extension', + 'modulus', 'symmetric'] + + @classmethod + def postprocess(cls, options): + if 'split' in options: + raise NotImplementedError("'split' option is not implemented yet") + + +class Gaussian(BooleanOption, metaclass=OptionType): + """``gaussian`` option to polynomial manipulation functions. """ + + option = 'gaussian' + + requires: list[str] = [] + excludes = ['field', 'greedy', 'domain', 'split', 'extension', + 'modulus', 'symmetric'] + + @classmethod + def postprocess(cls, options): + if 'gaussian' in options and options['gaussian'] is True: + options['domain'] = sympy.polys.domains.QQ_I + Extension.postprocess(options) + + +class Extension(Option, metaclass=OptionType): + """``extension`` option to polynomial manipulation functions. """ + + option = 'extension' + + requires: list[str] = [] + excludes = ['greedy', 'domain', 'split', 'gaussian', 'modulus', + 'symmetric'] + + @classmethod + def preprocess(cls, extension): + if extension == 1: + return bool(extension) + elif extension == 0: + raise OptionError("'False' is an invalid argument for 'extension'") + else: + if not hasattr(extension, '__iter__'): + extension = {extension} + else: + if not extension: + extension = None + else: + extension = set(extension) + + return extension + + @classmethod + def postprocess(cls, options): + if 'extension' in options and options['extension'] is not True: + options['domain'] = sympy.polys.domains.QQ.algebraic_field( + *options['extension']) + + +class Modulus(Option, metaclass=OptionType): + """``modulus`` option to polynomial manipulation functions. """ + + option = 'modulus' + + requires: list[str] = [] + excludes = ['greedy', 'split', 'domain', 'gaussian', 'extension'] + + @classmethod + def preprocess(cls, modulus): + modulus = sympify(modulus) + + if modulus.is_Integer and modulus > 0: + return int(modulus) + else: + raise OptionError( + "'modulus' must a positive integer, got %s" % modulus) + + @classmethod + def postprocess(cls, options): + if 'modulus' in options: + modulus = options['modulus'] + symmetric = options.get('symmetric', True) + options['domain'] = sympy.polys.domains.FF(modulus, symmetric) + + +class Symmetric(BooleanOption, metaclass=OptionType): + """``symmetric`` option to polynomial manipulation functions. """ + + option = 'symmetric' + + requires = ['modulus'] + excludes = ['greedy', 'domain', 'split', 'gaussian', 'extension'] + + +class Strict(BooleanOption, metaclass=OptionType): + """``strict`` option to polynomial manipulation functions. """ + + option = 'strict' + + @classmethod + def default(cls): + return True + + +class Auto(BooleanOption, Flag, metaclass=OptionType): + """``auto`` flag to polynomial manipulation functions. """ + + option = 'auto' + + after = ['field', 'domain', 'extension', 'gaussian'] + + @classmethod + def default(cls): + return True + + @classmethod + def postprocess(cls, options): + if ('domain' in options or 'field' in options) and 'auto' not in options: + options['auto'] = False + + +class Frac(BooleanOption, Flag, metaclass=OptionType): + """``auto`` option to polynomial manipulation functions. """ + + option = 'frac' + + @classmethod + def default(cls): + return False + + +class Formal(BooleanOption, Flag, metaclass=OptionType): + """``formal`` flag to polynomial manipulation functions. """ + + option = 'formal' + + @classmethod + def default(cls): + return False + + +class Polys(BooleanOption, Flag, metaclass=OptionType): + """``polys`` flag to polynomial manipulation functions. """ + + option = 'polys' + + +class Include(BooleanOption, Flag, metaclass=OptionType): + """``include`` flag to polynomial manipulation functions. """ + + option = 'include' + + @classmethod + def default(cls): + return False + + +class All(BooleanOption, Flag, metaclass=OptionType): + """``all`` flag to polynomial manipulation functions. """ + + option = 'all' + + @classmethod + def default(cls): + return False + + +class Gen(Flag, metaclass=OptionType): + """``gen`` flag to polynomial manipulation functions. """ + + option = 'gen' + + @classmethod + def default(cls): + return 0 + + @classmethod + def preprocess(cls, gen): + if isinstance(gen, (Basic, int)): + return gen + else: + raise OptionError("invalid argument for 'gen' option") + + +class Series(BooleanOption, Flag, metaclass=OptionType): + """``series`` flag to polynomial manipulation functions. """ + + option = 'series' + + @classmethod + def default(cls): + return False + + +class Symbols(Flag, metaclass=OptionType): + """``symbols`` flag to polynomial manipulation functions. """ + + option = 'symbols' + + @classmethod + def default(cls): + return numbered_symbols('s', start=1) + + @classmethod + def preprocess(cls, symbols): + if hasattr(symbols, '__iter__'): + return iter(symbols) + else: + raise OptionError("expected an iterator or iterable container, got %s" % symbols) + + +class Method(Flag, metaclass=OptionType): + """``method`` flag to polynomial manipulation functions. """ + + option = 'method' + + @classmethod + def preprocess(cls, method): + if isinstance(method, str): + return method.lower() + else: + raise OptionError("expected a string, got %s" % method) + + +def build_options(gens, args=None): + """Construct options from keyword arguments or ... options. """ + if args is None: + gens, args = (), gens + + if len(args) != 1 or 'opt' not in args or gens: + return Options(gens, args) + else: + return args['opt'] + + +def allowed_flags(args, flags): + """ + Allow specified flags to be used in the given context. + + Examples + ======== + + >>> from sympy.polys.polyoptions import allowed_flags + >>> from sympy.polys.domains import ZZ + + >>> allowed_flags({'domain': ZZ}, []) + + >>> allowed_flags({'domain': ZZ, 'frac': True}, []) + Traceback (most recent call last): + ... + FlagError: 'frac' flag is not allowed in this context + + >>> allowed_flags({'domain': ZZ, 'frac': True}, ['frac']) + + """ + flags = set(flags) + + for arg in args.keys(): + try: + if Options.__options__[arg].is_Flag and arg not in flags: + raise FlagError( + "'%s' flag is not allowed in this context" % arg) + except KeyError: + raise OptionError("'%s' is not a valid option" % arg) + + +def set_defaults(options, **defaults): + """Update options with default values. """ + if 'defaults' not in options: + options = dict(options) + options['defaults'] = defaults + + return options + +Options._init_dependencies_order() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyquinticconst.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyquinticconst.py new file mode 100644 index 0000000000000000000000000000000000000000..3b17096fd2cf3b205c3b819eb11ffc2012ea125b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyquinticconst.py @@ -0,0 +1,187 @@ +""" +Solving solvable quintics - An implementation of DS Dummit's paper + +Paper : +https://www.ams.org/journals/mcom/1991-57-195/S0025-5718-1991-1079014-X/S0025-5718-1991-1079014-X.pdf + +Mathematica notebook: +http://www.emba.uvm.edu/~ddummit/quintics/quintics.nb + +""" + + +from sympy.core import Symbol +from sympy.core.evalf import N +from sympy.core.numbers import I, Rational +from sympy.functions import sqrt +from sympy.polys.polytools import Poly +from sympy.utilities import public + +x = Symbol('x') + +@public +class PolyQuintic: + """Special functions for solvable quintics""" + def __init__(self, poly): + _, _, self.p, self.q, self.r, self.s = poly.all_coeffs() + self.zeta1 = Rational(-1, 4) + (sqrt(5)/4) + I*sqrt((sqrt(5)/8) + Rational(5, 8)) + self.zeta2 = (-sqrt(5)/4) - Rational(1, 4) + I*sqrt((-sqrt(5)/8) + Rational(5, 8)) + self.zeta3 = (-sqrt(5)/4) - Rational(1, 4) - I*sqrt((-sqrt(5)/8) + Rational(5, 8)) + self.zeta4 = Rational(-1, 4) + (sqrt(5)/4) - I*sqrt((sqrt(5)/8) + Rational(5, 8)) + + @property + def f20(self): + p, q, r, s = self.p, self.q, self.r, self.s + f20 = q**8 - 13*p*q**6*r + p**5*q**2*r**2 + 65*p**2*q**4*r**2 - 4*p**6*r**3 - 128*p**3*q**2*r**3 + 17*q**4*r**3 + 48*p**4*r**4 - 16*p*q**2*r**4 - 192*p**2*r**5 + 256*r**6 - 4*p**5*q**3*s - 12*p**2*q**5*s + 18*p**6*q*r*s + 12*p**3*q**3*r*s - 124*q**5*r*s + 196*p**4*q*r**2*s + 590*p*q**3*r**2*s - 160*p**2*q*r**3*s - 1600*q*r**4*s - 27*p**7*s**2 - 150*p**4*q**2*s**2 - 125*p*q**4*s**2 - 99*p**5*r*s**2 - 725*p**2*q**2*r*s**2 + 1200*p**3*r**2*s**2 + 3250*q**2*r**2*s**2 - 2000*p*r**3*s**2 - 1250*p*q*r*s**3 + 3125*p**2*s**4 - 9375*r*s**4-(2*p*q**6 - 19*p**2*q**4*r + 51*p**3*q**2*r**2 - 3*q**4*r**2 - 32*p**4*r**3 - 76*p*q**2*r**3 + 256*p**2*r**4 - 512*r**5 + 31*p**3*q**3*s + 58*q**5*s - 117*p**4*q*r*s - 105*p*q**3*r*s - 260*p**2*q*r**2*s + 2400*q*r**3*s + 108*p**5*s**2 + 325*p**2*q**2*s**2 - 525*p**3*r*s**2 - 2750*q**2*r*s**2 + 500*p*r**2*s**2 - 625*p*q*s**3 + 3125*s**4)*x+(p**2*q**4 - 6*p**3*q**2*r - 8*q**4*r + 9*p**4*r**2 + 76*p*q**2*r**2 - 136*p**2*r**3 + 400*r**4 - 50*p*q**3*s + 90*p**2*q*r*s - 1400*q*r**2*s + 625*q**2*s**2 + 500*p*r*s**2)*x**2-(2*q**4 - 21*p*q**2*r + 40*p**2*r**2 - 160*r**3 + 15*p**2*q*s + 400*q*r*s - 125*p*s**2)*x**3+(2*p*q**2 - 6*p**2*r + 40*r**2 - 50*q*s)*x**4 + 8*r*x**5 + x**6 + return Poly(f20, x) + + @property + def b(self): + p, q, r, s = self.p, self.q, self.r, self.s + b = ( [], [0,0,0,0,0,0], [0,0,0,0,0,0], [0,0,0,0,0,0], [0,0,0,0,0,0],) + + b[1][5] = 100*p**7*q**7 + 2175*p**4*q**9 + 10500*p*q**11 - 1100*p**8*q**5*r - 27975*p**5*q**7*r - 152950*p**2*q**9*r + 4125*p**9*q**3*r**2 + 128875*p**6*q**5*r**2 + 830525*p**3*q**7*r**2 - 59450*q**9*r**2 - 5400*p**10*q*r**3 - 243800*p**7*q**3*r**3 - 2082650*p**4*q**5*r**3 + 333925*p*q**7*r**3 + 139200*p**8*q*r**4 + 2406000*p**5*q**3*r**4 + 122600*p**2*q**5*r**4 - 1254400*p**6*q*r**5 - 3776000*p**3*q**3*r**5 - 1832000*q**5*r**5 + 4736000*p**4*q*r**6 + 6720000*p*q**3*r**6 - 6400000*p**2*q*r**7 + 900*p**9*q**4*s + 37400*p**6*q**6*s + 281625*p**3*q**8*s + 435000*q**10*s - 6750*p**10*q**2*r*s - 322300*p**7*q**4*r*s - 2718575*p**4*q**6*r*s - 4214250*p*q**8*r*s + 16200*p**11*r**2*s + 859275*p**8*q**2*r**2*s + 8925475*p**5*q**4*r**2*s + 14427875*p**2*q**6*r**2*s - 453600*p**9*r**3*s - 10038400*p**6*q**2*r**3*s - 17397500*p**3*q**4*r**3*s + 11333125*q**6*r**3*s + 4451200*p**7*r**4*s + 15850000*p**4*q**2*r**4*s - 34000000*p*q**4*r**4*s - 17984000*p**5*r**5*s + 10000000*p**2*q**2*r**5*s + 25600000*p**3*r**6*s + 8000000*q**2*r**6*s - 6075*p**11*q*s**2 + 83250*p**8*q**3*s**2 + 1282500*p**5*q**5*s**2 + 2862500*p**2*q**7*s**2 - 724275*p**9*q*r*s**2 - 9807250*p**6*q**3*r*s**2 - 28374375*p**3*q**5*r*s**2 - 22212500*q**7*r*s**2 + 8982000*p**7*q*r**2*s**2 + 39600000*p**4*q**3*r**2*s**2 + 61746875*p*q**5*r**2*s**2 + 1010000*p**5*q*r**3*s**2 + 1000000*p**2*q**3*r**3*s**2 - 78000000*p**3*q*r**4*s**2 - 30000000*q**3*r**4*s**2 - 80000000*p*q*r**5*s**2 + 759375*p**10*s**3 + 9787500*p**7*q**2*s**3 + 39062500*p**4*q**4*s**3 + 52343750*p*q**6*s**3 - 12301875*p**8*r*s**3 - 98175000*p**5*q**2*r*s**3 - 225078125*p**2*q**4*r*s**3 + 54900000*p**6*r**2*s**3 + 310000000*p**3*q**2*r**2*s**3 + 7890625*q**4*r**2*s**3 - 51250000*p**4*r**3*s**3 + 420000000*p*q**2*r**3*s**3 - 110000000*p**2*r**4*s**3 + 200000000*r**5*s**3 - 2109375*p**6*q*s**4 + 21093750*p**3*q**3*s**4 + 89843750*q**5*s**4 - 182343750*p**4*q*r*s**4 - 733203125*p*q**3*r*s**4 + 196875000*p**2*q*r**2*s**4 - 1125000000*q*r**3*s**4 + 158203125*p**5*s**5 + 566406250*p**2*q**2*s**5 - 101562500*p**3*r*s**5 + 1669921875*q**2*r*s**5 - 1250000000*p*r**2*s**5 + 1220703125*p*q*s**6 - 6103515625*s**7 + + b[1][4] = -1000*p**5*q**7 - 7250*p**2*q**9 + 10800*p**6*q**5*r + 96900*p**3*q**7*r + 52500*q**9*r - 37400*p**7*q**3*r**2 - 470850*p**4*q**5*r**2 - 640600*p*q**7*r**2 + 39600*p**8*q*r**3 + 983600*p**5*q**3*r**3 + 2848100*p**2*q**5*r**3 - 814400*p**6*q*r**4 - 6076000*p**3*q**3*r**4 - 2308000*q**5*r**4 + 5024000*p**4*q*r**5 + 9680000*p*q**3*r**5 - 9600000*p**2*q*r**6 - 13800*p**7*q**4*s - 94650*p**4*q**6*s + 26500*p*q**8*s + 86400*p**8*q**2*r*s + 816500*p**5*q**4*r*s + 257500*p**2*q**6*r*s - 91800*p**9*r**2*s - 1853700*p**6*q**2*r**2*s - 630000*p**3*q**4*r**2*s + 8971250*q**6*r**2*s + 2071200*p**7*r**3*s + 7240000*p**4*q**2*r**3*s - 29375000*p*q**4*r**3*s - 14416000*p**5*r**4*s + 5200000*p**2*q**2*r**4*s + 30400000*p**3*r**5*s + 12000000*q**2*r**5*s - 64800*p**9*q*s**2 - 567000*p**6*q**3*s**2 - 1655000*p**3*q**5*s**2 - 6987500*q**7*s**2 - 337500*p**7*q*r*s**2 - 8462500*p**4*q**3*r*s**2 + 5812500*p*q**5*r*s**2 + 24930000*p**5*q*r**2*s**2 + 69125000*p**2*q**3*r**2*s**2 - 103500000*p**3*q*r**3*s**2 - 30000000*q**3*r**3*s**2 - 90000000*p*q*r**4*s**2 + 708750*p**8*s**3 + 5400000*p**5*q**2*s**3 - 8906250*p**2*q**4*s**3 - 18562500*p**6*r*s**3 + 625000*p**3*q**2*r*s**3 - 29687500*q**4*r*s**3 + 75000000*p**4*r**2*s**3 + 416250000*p*q**2*r**2*s**3 - 60000000*p**2*r**3*s**3 + 300000000*r**4*s**3 - 71718750*p**4*q*s**4 - 189062500*p*q**3*s**4 - 210937500*p**2*q*r*s**4 - 1187500000*q*r**2*s**4 + 187500000*p**3*s**5 + 800781250*q**2*s**5 + 390625000*p*r*s**5 + + b[1][3] = 500*p**6*q**5 + 6350*p**3*q**7 + 19800*q**9 - 3750*p**7*q**3*r - 65100*p**4*q**5*r - 264950*p*q**7*r + 6750*p**8*q*r**2 + 209050*p**5*q**3*r**2 + 1217250*p**2*q**5*r**2 - 219000*p**6*q*r**3 - 2510000*p**3*q**3*r**3 - 1098500*q**5*r**3 + 2068000*p**4*q*r**4 + 5060000*p*q**3*r**4 - 5200000*p**2*q*r**5 + 6750*p**8*q**2*s + 96350*p**5*q**4*s + 346000*p**2*q**6*s - 20250*p**9*r*s - 459900*p**6*q**2*r*s - 1828750*p**3*q**4*r*s + 2930000*q**6*r*s + 594000*p**7*r**2*s + 4301250*p**4*q**2*r**2*s - 10906250*p*q**4*r**2*s - 5252000*p**5*r**3*s + 1450000*p**2*q**2*r**3*s + 12800000*p**3*r**4*s + 6500000*q**2*r**4*s - 74250*p**7*q*s**2 - 1418750*p**4*q**3*s**2 - 5956250*p*q**5*s**2 + 4297500*p**5*q*r*s**2 + 29906250*p**2*q**3*r*s**2 - 31500000*p**3*q*r**2*s**2 - 12500000*q**3*r**2*s**2 - 35000000*p*q*r**3*s**2 - 1350000*p**6*s**3 - 6093750*p**3*q**2*s**3 - 17500000*q**4*s**3 + 7031250*p**4*r*s**3 + 127812500*p*q**2*r*s**3 - 18750000*p**2*r**2*s**3 + 162500000*r**3*s**3 - 107812500*p**2*q*s**4 - 460937500*q*r*s**4 + 214843750*p*s**5 + + b[1][2] = -1950*p**4*q**5 - 14100*p*q**7 + 14350*p**5*q**3*r + 125600*p**2*q**5*r - 27900*p**6*q*r**2 - 402250*p**3*q**3*r**2 - 288250*q**5*r**2 + 436000*p**4*q*r**3 + 1345000*p*q**3*r**3 - 1400000*p**2*q*r**4 - 9450*p**6*q**2*s + 1250*p**3*q**4*s + 465000*q**6*s + 49950*p**7*r*s + 302500*p**4*q**2*r*s - 1718750*p*q**4*r*s - 834000*p**5*r**2*s - 437500*p**2*q**2*r**2*s + 3100000*p**3*r**3*s + 1750000*q**2*r**3*s + 292500*p**5*q*s**2 + 1937500*p**2*q**3*s**2 - 3343750*p**3*q*r*s**2 - 1875000*q**3*r*s**2 - 8125000*p*q*r**2*s**2 + 1406250*p**4*s**3 + 12343750*p*q**2*s**3 - 5312500*p**2*r*s**3 + 43750000*r**2*s**3 - 74218750*q*s**4 + + b[1][1] = 300*p**5*q**3 + 2150*p**2*q**5 - 1350*p**6*q*r - 21500*p**3*q**3*r - 61500*q**5*r + 42000*p**4*q*r**2 + 290000*p*q**3*r**2 - 300000*p**2*q*r**3 + 4050*p**7*s + 45000*p**4*q**2*s + 125000*p*q**4*s - 108000*p**5*r*s - 643750*p**2*q**2*r*s + 700000*p**3*r**2*s + 375000*q**2*r**2*s + 93750*p**3*q*s**2 + 312500*q**3*s**2 - 1875000*p*q*r*s**2 + 1406250*p**2*s**3 + 9375000*r*s**3 + + b[1][0] = -1250*p**3*q**3 - 9000*q**5 + 4500*p**4*q*r + 46250*p*q**3*r - 50000*p**2*q*r**2 - 6750*p**5*s - 43750*p**2*q**2*s + 75000*p**3*r*s + 62500*q**2*r*s - 156250*p*q*s**2 + 1562500*s**3 + + b[2][5] = 200*p**6*q**11 - 250*p**3*q**13 - 10800*q**15 - 3900*p**7*q**9*r - 3325*p**4*q**11*r + 181800*p*q**13*r + 26950*p**8*q**7*r**2 + 69625*p**5*q**9*r**2 - 1214450*p**2*q**11*r**2 - 78725*p**9*q**5*r**3 - 368675*p**6*q**7*r**3 + 4166325*p**3*q**9*r**3 + 1131100*q**11*r**3 + 73400*p**10*q**3*r**4 + 661950*p**7*q**5*r**4 - 9151950*p**4*q**7*r**4 - 16633075*p*q**9*r**4 + 36000*p**11*q*r**5 + 135600*p**8*q**3*r**5 + 17321400*p**5*q**5*r**5 + 85338300*p**2*q**7*r**5 - 832000*p**9*q*r**6 - 21379200*p**6*q**3*r**6 - 176044000*p**3*q**5*r**6 - 1410000*q**7*r**6 + 6528000*p**7*q*r**7 + 129664000*p**4*q**3*r**7 + 47344000*p*q**5*r**7 - 21504000*p**5*q*r**8 - 115200000*p**2*q**3*r**8 + 25600000*p**3*q*r**9 + 64000000*q**3*r**9 + 15700*p**8*q**8*s + 120525*p**5*q**10*s + 113250*p**2*q**12*s - 196900*p**9*q**6*r*s - 1776925*p**6*q**8*r*s - 3062475*p**3*q**10*r*s - 4153500*q**12*r*s + 857925*p**10*q**4*r**2*s + 10562775*p**7*q**6*r**2*s + 34866250*p**4*q**8*r**2*s + 73486750*p*q**10*r**2*s - 1333800*p**11*q**2*r**3*s - 29212625*p**8*q**4*r**3*s - 168729675*p**5*q**6*r**3*s - 427230750*p**2*q**8*r**3*s + 108000*p**12*r**4*s + 30384200*p**9*q**2*r**4*s + 324535100*p**6*q**4*r**4*s + 952666750*p**3*q**6*r**4*s - 38076875*q**8*r**4*s - 4296000*p**10*r**5*s - 213606400*p**7*q**2*r**5*s - 842060000*p**4*q**4*r**5*s - 95285000*p*q**6*r**5*s + 61184000*p**8*r**6*s + 567520000*p**5*q**2*r**6*s + 547000000*p**2*q**4*r**6*s - 390912000*p**6*r**7*s - 812800000*p**3*q**2*r**7*s - 924000000*q**4*r**7*s + 1152000000*p**4*r**8*s + 800000000*p*q**2*r**8*s - 1280000000*p**2*r**9*s + 141750*p**10*q**5*s**2 - 31500*p**7*q**7*s**2 - 11325000*p**4*q**9*s**2 - 31687500*p*q**11*s**2 - 1293975*p**11*q**3*r*s**2 - 4803800*p**8*q**5*r*s**2 + 71398250*p**5*q**7*r*s**2 + 227625000*p**2*q**9*r*s**2 + 3256200*p**12*q*r**2*s**2 + 43870125*p**9*q**3*r**2*s**2 + 64581500*p**6*q**5*r**2*s**2 + 56090625*p**3*q**7*r**2*s**2 + 260218750*q**9*r**2*s**2 - 74610000*p**10*q*r**3*s**2 - 662186500*p**7*q**3*r**3*s**2 - 1987747500*p**4*q**5*r**3*s**2 - 811928125*p*q**7*r**3*s**2 + 471286000*p**8*q*r**4*s**2 + 2106040000*p**5*q**3*r**4*s**2 + 792687500*p**2*q**5*r**4*s**2 - 135120000*p**6*q*r**5*s**2 + 2479000000*p**3*q**3*r**5*s**2 + 5242250000*q**5*r**5*s**2 - 6400000000*p**4*q*r**6*s**2 - 8620000000*p*q**3*r**6*s**2 + 13280000000*p**2*q*r**7*s**2 + 1600000000*q*r**8*s**2 + 273375*p**12*q**2*s**3 - 13612500*p**9*q**4*s**3 - 177250000*p**6*q**6*s**3 - 511015625*p**3*q**8*s**3 - 320937500*q**10*s**3 - 2770200*p**13*r*s**3 + 12595500*p**10*q**2*r*s**3 + 543950000*p**7*q**4*r*s**3 + 1612281250*p**4*q**6*r*s**3 + 968125000*p*q**8*r*s**3 + 77031000*p**11*r**2*s**3 + 373218750*p**8*q**2*r**2*s**3 + 1839765625*p**5*q**4*r**2*s**3 + 1818515625*p**2*q**6*r**2*s**3 - 776745000*p**9*r**3*s**3 - 6861075000*p**6*q**2*r**3*s**3 - 20014531250*p**3*q**4*r**3*s**3 - 13747812500*q**6*r**3*s**3 + 3768000000*p**7*r**4*s**3 + 35365000000*p**4*q**2*r**4*s**3 + 34441875000*p*q**4*r**4*s**3 - 9628000000*p**5*r**5*s**3 - 63230000000*p**2*q**2*r**5*s**3 + 13600000000*p**3*r**6*s**3 - 15000000000*q**2*r**6*s**3 - 10400000000*p*r**7*s**3 - 45562500*p**11*q*s**4 - 525937500*p**8*q**3*s**4 - 1364218750*p**5*q**5*s**4 - 1382812500*p**2*q**7*s**4 + 572062500*p**9*q*r*s**4 + 2473515625*p**6*q**3*r*s**4 + 13192187500*p**3*q**5*r*s**4 + 12703125000*q**7*r*s**4 - 451406250*p**7*q*r**2*s**4 - 18153906250*p**4*q**3*r**2*s**4 - 36908203125*p*q**5*r**2*s**4 - 9069375000*p**5*q*r**3*s**4 + 79957812500*p**2*q**3*r**3*s**4 + 5512500000*p**3*q*r**4*s**4 + 50656250000*q**3*r**4*s**4 + 74750000000*p*q*r**5*s**4 + 56953125*p**10*s**5 + 1381640625*p**7*q**2*s**5 - 781250000*p**4*q**4*s**5 + 878906250*p*q**6*s**5 - 2655703125*p**8*r*s**5 - 3223046875*p**5*q**2*r*s**5 - 35117187500*p**2*q**4*r*s**5 + 26573437500*p**6*r**2*s**5 + 14785156250*p**3*q**2*r**2*s**5 - 52050781250*q**4*r**2*s**5 - 103062500000*p**4*r**3*s**5 - 281796875000*p*q**2*r**3*s**5 + 146875000000*p**2*r**4*s**5 - 37500000000*r**5*s**5 - 8789062500*p**6*q*s**6 - 3906250000*p**3*q**3*s**6 + 1464843750*q**5*s**6 + 102929687500*p**4*q*r*s**6 + 297119140625*p*q**3*r*s**6 - 217773437500*p**2*q*r**2*s**6 + 167968750000*q*r**3*s**6 + 10986328125*p**5*s**7 + 98876953125*p**2*q**2*s**7 - 188964843750*p**3*r*s**7 - 278320312500*q**2*r*s**7 + 517578125000*p*r**2*s**7 - 610351562500*p*q*s**8 + 762939453125*s**9 + + b[2][4] = -200*p**7*q**9 + 1850*p**4*q**11 + 21600*p*q**13 + 3200*p**8*q**7*r - 19200*p**5*q**9*r - 316350*p**2*q**11*r - 19050*p**9*q**5*r**2 + 37400*p**6*q**7*r**2 + 1759250*p**3*q**9*r**2 + 440100*q**11*r**2 + 48750*p**10*q**3*r**3 + 190200*p**7*q**5*r**3 - 4604200*p**4*q**7*r**3 - 6072800*p*q**9*r**3 - 43200*p**11*q*r**4 - 834500*p**8*q**3*r**4 + 4916000*p**5*q**5*r**4 + 27926850*p**2*q**7*r**4 + 969600*p**9*q*r**5 + 2467200*p**6*q**3*r**5 - 45393200*p**3*q**5*r**5 - 5399500*q**7*r**5 - 7283200*p**7*q*r**6 + 10536000*p**4*q**3*r**6 + 41656000*p*q**5*r**6 + 22784000*p**5*q*r**7 - 35200000*p**2*q**3*r**7 - 25600000*p**3*q*r**8 + 96000000*q**3*r**8 - 3000*p**9*q**6*s + 40400*p**6*q**8*s + 136550*p**3*q**10*s - 1647000*q**12*s + 40500*p**10*q**4*r*s - 173600*p**7*q**6*r*s - 126500*p**4*q**8*r*s + 23969250*p*q**10*r*s - 153900*p**11*q**2*r**2*s - 486150*p**8*q**4*r**2*s - 4115800*p**5*q**6*r**2*s - 112653250*p**2*q**8*r**2*s + 129600*p**12*r**3*s + 2683350*p**9*q**2*r**3*s + 10906650*p**6*q**4*r**3*s + 187289500*p**3*q**6*r**3*s + 44098750*q**8*r**3*s - 4384800*p**10*r**4*s - 35660800*p**7*q**2*r**4*s - 175420000*p**4*q**4*r**4*s - 426538750*p*q**6*r**4*s + 60857600*p**8*r**5*s + 349436000*p**5*q**2*r**5*s + 900600000*p**2*q**4*r**5*s - 429568000*p**6*r**6*s - 1511200000*p**3*q**2*r**6*s - 1286000000*q**4*r**6*s + 1472000000*p**4*r**7*s + 1440000000*p*q**2*r**7*s - 1920000000*p**2*r**8*s - 36450*p**11*q**3*s**2 - 188100*p**8*q**5*s**2 - 5504750*p**5*q**7*s**2 - 37968750*p**2*q**9*s**2 + 255150*p**12*q*r*s**2 + 2754000*p**9*q**3*r*s**2 + 49196500*p**6*q**5*r*s**2 + 323587500*p**3*q**7*r*s**2 - 83250000*q**9*r*s**2 - 465750*p**10*q*r**2*s**2 - 31881500*p**7*q**3*r**2*s**2 - 415585000*p**4*q**5*r**2*s**2 + 1054775000*p*q**7*r**2*s**2 - 96823500*p**8*q*r**3*s**2 - 701490000*p**5*q**3*r**3*s**2 - 2953531250*p**2*q**5*r**3*s**2 + 1454560000*p**6*q*r**4*s**2 + 7670500000*p**3*q**3*r**4*s**2 + 5661062500*q**5*r**4*s**2 - 7785000000*p**4*q*r**5*s**2 - 9450000000*p*q**3*r**5*s**2 + 14000000000*p**2*q*r**6*s**2 + 2400000000*q*r**7*s**2 - 437400*p**13*s**3 - 10145250*p**10*q**2*s**3 - 121912500*p**7*q**4*s**3 - 576531250*p**4*q**6*s**3 - 528593750*p*q**8*s**3 + 12939750*p**11*r*s**3 + 313368750*p**8*q**2*r*s**3 + 2171812500*p**5*q**4*r*s**3 + 2381718750*p**2*q**6*r*s**3 - 124638750*p**9*r**2*s**3 - 3001575000*p**6*q**2*r**2*s**3 - 12259375000*p**3*q**4*r**2*s**3 - 9985312500*q**6*r**2*s**3 + 384000000*p**7*r**3*s**3 + 13997500000*p**4*q**2*r**3*s**3 + 20749531250*p*q**4*r**3*s**3 - 553500000*p**5*r**4*s**3 - 41835000000*p**2*q**2*r**4*s**3 + 5420000000*p**3*r**5*s**3 - 16300000000*q**2*r**5*s**3 - 17600000000*p*r**6*s**3 - 7593750*p**9*q*s**4 + 289218750*p**6*q**3*s**4 + 3591406250*p**3*q**5*s**4 + 5992187500*q**7*s**4 + 658125000*p**7*q*r*s**4 - 269531250*p**4*q**3*r*s**4 - 15882812500*p*q**5*r*s**4 - 4785000000*p**5*q*r**2*s**4 + 54375781250*p**2*q**3*r**2*s**4 - 5668750000*p**3*q*r**3*s**4 + 35867187500*q**3*r**3*s**4 + 113875000000*p*q*r**4*s**4 - 544218750*p**8*s**5 - 5407031250*p**5*q**2*s**5 - 14277343750*p**2*q**4*s**5 + 5421093750*p**6*r*s**5 - 24941406250*p**3*q**2*r*s**5 - 25488281250*q**4*r*s**5 - 11500000000*p**4*r**2*s**5 - 231894531250*p*q**2*r**2*s**5 - 6250000000*p**2*r**3*s**5 - 43750000000*r**4*s**5 + 35449218750*p**4*q*s**6 + 137695312500*p*q**3*s**6 + 34667968750*p**2*q*r*s**6 + 202148437500*q*r**2*s**6 - 33691406250*p**3*s**7 - 214843750000*q**2*s**7 - 31738281250*p*r*s**7 + + b[2][3] = -800*p**5*q**9 - 5400*p**2*q**11 + 5800*p**6*q**7*r + 48750*p**3*q**9*r + 16200*q**11*r - 3000*p**7*q**5*r**2 - 108350*p**4*q**7*r**2 - 263250*p*q**9*r**2 - 60700*p**8*q**3*r**3 - 386250*p**5*q**5*r**3 + 253100*p**2*q**7*r**3 + 127800*p**9*q*r**4 + 2326700*p**6*q**3*r**4 + 6565550*p**3*q**5*r**4 - 705750*q**7*r**4 - 2903200*p**7*q*r**5 - 21218000*p**4*q**3*r**5 + 1057000*p*q**5*r**5 + 20368000*p**5*q*r**6 + 33000000*p**2*q**3*r**6 - 43200000*p**3*q*r**7 + 52000000*q**3*r**7 + 6200*p**7*q**6*s + 188250*p**4*q**8*s + 931500*p*q**10*s - 73800*p**8*q**4*r*s - 1466850*p**5*q**6*r*s - 6894000*p**2*q**8*r*s + 315900*p**9*q**2*r**2*s + 4547000*p**6*q**4*r**2*s + 20362500*p**3*q**6*r**2*s + 15018750*q**8*r**2*s - 653400*p**10*r**3*s - 13897550*p**7*q**2*r**3*s - 76757500*p**4*q**4*r**3*s - 124207500*p*q**6*r**3*s + 18567600*p**8*r**4*s + 175911000*p**5*q**2*r**4*s + 253787500*p**2*q**4*r**4*s - 183816000*p**6*r**5*s - 706900000*p**3*q**2*r**5*s - 665750000*q**4*r**5*s + 740000000*p**4*r**6*s + 890000000*p*q**2*r**6*s - 1040000000*p**2*r**7*s - 763000*p**6*q**5*s**2 - 12375000*p**3*q**7*s**2 - 40500000*q**9*s**2 + 364500*p**10*q*r*s**2 + 15537000*p**7*q**3*r*s**2 + 154392500*p**4*q**5*r*s**2 + 372206250*p*q**7*r*s**2 - 25481250*p**8*q*r**2*s**2 - 386300000*p**5*q**3*r**2*s**2 - 996343750*p**2*q**5*r**2*s**2 + 459872500*p**6*q*r**3*s**2 + 2943937500*p**3*q**3*r**3*s**2 + 2437781250*q**5*r**3*s**2 - 2883750000*p**4*q*r**4*s**2 - 4343750000*p*q**3*r**4*s**2 + 5495000000*p**2*q*r**5*s**2 + 1300000000*q*r**6*s**2 - 364500*p**11*s**3 - 13668750*p**8*q**2*s**3 - 113406250*p**5*q**4*s**3 - 159062500*p**2*q**6*s**3 + 13972500*p**9*r*s**3 + 61537500*p**6*q**2*r*s**3 - 1622656250*p**3*q**4*r*s**3 - 2720625000*q**6*r*s**3 - 201656250*p**7*r**2*s**3 + 1949687500*p**4*q**2*r**2*s**3 + 4979687500*p*q**4*r**2*s**3 + 497125000*p**5*r**3*s**3 - 11150625000*p**2*q**2*r**3*s**3 + 2982500000*p**3*r**4*s**3 - 6612500000*q**2*r**4*s**3 - 10450000000*p*r**5*s**3 + 126562500*p**7*q*s**4 + 1443750000*p**4*q**3*s**4 + 281250000*p*q**5*s**4 - 1648125000*p**5*q*r*s**4 + 11271093750*p**2*q**3*r*s**4 - 4785156250*p**3*q*r**2*s**4 + 8808593750*q**3*r**2*s**4 + 52390625000*p*q*r**3*s**4 - 611718750*p**6*s**5 - 13027343750*p**3*q**2*s**5 - 1464843750*q**4*s**5 + 6492187500*p**4*r*s**5 - 65351562500*p*q**2*r*s**5 - 13476562500*p**2*r**2*s**5 - 24218750000*r**3*s**5 + 41992187500*p**2*q*s**6 + 69824218750*q*r*s**6 - 34179687500*p*s**7 + + b[2][2] = -1000*p**6*q**7 - 5150*p**3*q**9 + 10800*q**11 + 11000*p**7*q**5*r + 66450*p**4*q**7*r - 127800*p*q**9*r - 41250*p**8*q**3*r**2 - 368400*p**5*q**5*r**2 + 204200*p**2*q**7*r**2 + 54000*p**9*q*r**3 + 1040950*p**6*q**3*r**3 + 2096500*p**3*q**5*r**3 + 200000*q**7*r**3 - 1140000*p**7*q*r**4 - 7691000*p**4*q**3*r**4 - 2281000*p*q**5*r**4 + 7296000*p**5*q*r**5 + 13300000*p**2*q**3*r**5 - 14400000*p**3*q*r**6 + 14000000*q**3*r**6 - 9000*p**8*q**4*s + 52100*p**5*q**6*s + 710250*p**2*q**8*s + 67500*p**9*q**2*r*s - 256100*p**6*q**4*r*s - 5753000*p**3*q**6*r*s + 292500*q**8*r*s - 162000*p**10*r**2*s - 1432350*p**7*q**2*r**2*s + 5410000*p**4*q**4*r**2*s - 7408750*p*q**6*r**2*s + 4401000*p**8*r**3*s + 24185000*p**5*q**2*r**3*s + 20781250*p**2*q**4*r**3*s - 43012000*p**6*r**4*s - 146300000*p**3*q**2*r**4*s - 165875000*q**4*r**4*s + 182000000*p**4*r**5*s + 250000000*p*q**2*r**5*s - 280000000*p**2*r**6*s + 60750*p**10*q*s**2 + 2414250*p**7*q**3*s**2 + 15770000*p**4*q**5*s**2 + 15825000*p*q**7*s**2 - 6021000*p**8*q*r*s**2 - 62252500*p**5*q**3*r*s**2 - 74718750*p**2*q**5*r*s**2 + 90888750*p**6*q*r**2*s**2 + 471312500*p**3*q**3*r**2*s**2 + 525875000*q**5*r**2*s**2 - 539375000*p**4*q*r**3*s**2 - 1030000000*p*q**3*r**3*s**2 + 1142500000*p**2*q*r**4*s**2 + 350000000*q*r**5*s**2 - 303750*p**9*s**3 - 35943750*p**6*q**2*s**3 - 331875000*p**3*q**4*s**3 - 505937500*q**6*s**3 + 8437500*p**7*r*s**3 + 530781250*p**4*q**2*r*s**3 + 1150312500*p*q**4*r*s**3 - 154500000*p**5*r**2*s**3 - 2059062500*p**2*q**2*r**2*s**3 + 1150000000*p**3*r**3*s**3 - 1343750000*q**2*r**3*s**3 - 2900000000*p*r**4*s**3 + 30937500*p**5*q*s**4 + 1166406250*p**2*q**3*s**4 - 1496875000*p**3*q*r*s**4 + 1296875000*q**3*r*s**4 + 10640625000*p*q*r**2*s**4 - 281250000*p**4*s**5 - 9746093750*p*q**2*s**5 + 1269531250*p**2*r*s**5 - 7421875000*r**2*s**5 + 15625000000*q*s**6 + + b[2][1] = -1600*p**4*q**7 - 10800*p*q**9 + 9800*p**5*q**5*r + 80550*p**2*q**7*r - 4600*p**6*q**3*r**2 - 112700*p**3*q**5*r**2 + 40500*q**7*r**2 - 34200*p**7*q*r**3 - 279500*p**4*q**3*r**3 - 665750*p*q**5*r**3 + 632000*p**5*q*r**4 + 3200000*p**2*q**3*r**4 - 2800000*p**3*q*r**5 + 3000000*q**3*r**5 - 18600*p**6*q**4*s - 51750*p**3*q**6*s + 405000*q**8*s + 21600*p**7*q**2*r*s - 122500*p**4*q**4*r*s - 2891250*p*q**6*r*s + 156600*p**8*r**2*s + 1569750*p**5*q**2*r**2*s + 6943750*p**2*q**4*r**2*s - 3774000*p**6*r**3*s - 27100000*p**3*q**2*r**3*s - 30187500*q**4*r**3*s + 28000000*p**4*r**4*s + 52500000*p*q**2*r**4*s - 60000000*p**2*r**5*s - 81000*p**8*q*s**2 - 240000*p**5*q**3*s**2 + 937500*p**2*q**5*s**2 + 3273750*p**6*q*r*s**2 + 30406250*p**3*q**3*r*s**2 + 55687500*q**5*r*s**2 - 42187500*p**4*q*r**2*s**2 - 112812500*p*q**3*r**2*s**2 + 152500000*p**2*q*r**3*s**2 + 75000000*q*r**4*s**2 - 4218750*p**4*q**2*s**3 + 15156250*p*q**4*s**3 + 5906250*p**5*r*s**3 - 206562500*p**2*q**2*r*s**3 + 107500000*p**3*r**2*s**3 - 159375000*q**2*r**2*s**3 - 612500000*p*r**3*s**3 + 135937500*p**3*q*s**4 + 46875000*q**3*s**4 + 1175781250*p*q*r*s**4 - 292968750*p**2*s**5 - 1367187500*r*s**5 + + b[2][0] = -800*p**5*q**5 - 5400*p**2*q**7 + 6000*p**6*q**3*r + 51700*p**3*q**5*r + 27000*q**7*r - 10800*p**7*q*r**2 - 163250*p**4*q**3*r**2 - 285750*p*q**5*r**2 + 192000*p**5*q*r**3 + 1000000*p**2*q**3*r**3 - 800000*p**3*q*r**4 + 500000*q**3*r**4 - 10800*p**7*q**2*s - 57500*p**4*q**4*s + 67500*p*q**6*s + 32400*p**8*r*s + 279000*p**5*q**2*r*s - 131250*p**2*q**4*r*s - 729000*p**6*r**2*s - 4100000*p**3*q**2*r**2*s - 5343750*q**4*r**2*s + 5000000*p**4*r**3*s + 10000000*p*q**2*r**3*s - 10000000*p**2*r**4*s + 641250*p**6*q*s**2 + 5812500*p**3*q**3*s**2 + 10125000*q**5*s**2 - 7031250*p**4*q*r*s**2 - 20625000*p*q**3*r*s**2 + 17500000*p**2*q*r**2*s**2 + 12500000*q*r**3*s**2 - 843750*p**5*s**3 - 19375000*p**2*q**2*s**3 + 30000000*p**3*r*s**3 - 20312500*q**2*r*s**3 - 112500000*p*r**2*s**3 + 183593750*p*q*s**4 - 292968750*s**5 + + b[3][5] = 500*p**11*q**6 + 9875*p**8*q**8 + 42625*p**5*q**10 - 35000*p**2*q**12 - 4500*p**12*q**4*r - 108375*p**9*q**6*r - 516750*p**6*q**8*r + 1110500*p**3*q**10*r + 2730000*q**12*r + 10125*p**13*q**2*r**2 + 358250*p**10*q**4*r**2 + 1908625*p**7*q**6*r**2 - 11744250*p**4*q**8*r**2 - 43383250*p*q**10*r**2 - 313875*p**11*q**2*r**3 - 2074875*p**8*q**4*r**3 + 52094750*p**5*q**6*r**3 + 264567500*p**2*q**8*r**3 + 796125*p**9*q**2*r**4 - 92486250*p**6*q**4*r**4 - 757957500*p**3*q**6*r**4 - 29354375*q**8*r**4 + 60970000*p**7*q**2*r**5 + 1112462500*p**4*q**4*r**5 + 571094375*p*q**6*r**5 - 685290000*p**5*q**2*r**6 - 2037800000*p**2*q**4*r**6 + 2279600000*p**3*q**2*r**7 + 849000000*q**4*r**7 - 1480000000*p*q**2*r**8 + 13500*p**13*q**3*s + 363000*p**10*q**5*s + 2861250*p**7*q**7*s + 8493750*p**4*q**9*s + 17031250*p*q**11*s - 60750*p**14*q*r*s - 2319750*p**11*q**3*r*s - 22674250*p**8*q**5*r*s - 74368750*p**5*q**7*r*s - 170578125*p**2*q**9*r*s + 2760750*p**12*q*r**2*s + 46719000*p**9*q**3*r**2*s + 163356375*p**6*q**5*r**2*s + 360295625*p**3*q**7*r**2*s - 195990625*q**9*r**2*s - 37341750*p**10*q*r**3*s - 194739375*p**7*q**3*r**3*s - 105463125*p**4*q**5*r**3*s - 415825000*p*q**7*r**3*s + 90180000*p**8*q*r**4*s - 990552500*p**5*q**3*r**4*s + 3519212500*p**2*q**5*r**4*s + 1112220000*p**6*q*r**5*s - 4508750000*p**3*q**3*r**5*s - 8159500000*q**5*r**5*s - 4356000000*p**4*q*r**6*s + 14615000000*p*q**3*r**6*s - 2160000000*p**2*q*r**7*s + 91125*p**15*s**2 + 3290625*p**12*q**2*s**2 + 35100000*p**9*q**4*s**2 + 175406250*p**6*q**6*s**2 + 629062500*p**3*q**8*s**2 + 910937500*q**10*s**2 - 5710500*p**13*r*s**2 - 100423125*p**10*q**2*r*s**2 - 604743750*p**7*q**4*r*s**2 - 2954843750*p**4*q**6*r*s**2 - 4587578125*p*q**8*r*s**2 + 116194500*p**11*r**2*s**2 + 1280716250*p**8*q**2*r**2*s**2 + 7401190625*p**5*q**4*r**2*s**2 + 11619937500*p**2*q**6*r**2*s**2 - 952173125*p**9*r**3*s**2 - 6519712500*p**6*q**2*r**3*s**2 - 10238593750*p**3*q**4*r**3*s**2 + 29984609375*q**6*r**3*s**2 + 2558300000*p**7*r**4*s**2 + 16225000000*p**4*q**2*r**4*s**2 - 64994140625*p*q**4*r**4*s**2 + 4202250000*p**5*r**5*s**2 + 46925000000*p**2*q**2*r**5*s**2 - 28950000000*p**3*r**6*s**2 - 1000000000*q**2*r**6*s**2 + 37000000000*p*r**7*s**2 - 48093750*p**11*q*s**3 - 673359375*p**8*q**3*s**3 - 2170312500*p**5*q**5*s**3 - 2466796875*p**2*q**7*s**3 + 647578125*p**9*q*r*s**3 + 597031250*p**6*q**3*r*s**3 - 7542578125*p**3*q**5*r*s**3 - 41125000000*q**7*r*s**3 - 2175828125*p**7*q*r**2*s**3 - 7101562500*p**4*q**3*r**2*s**3 + 100596875000*p*q**5*r**2*s**3 - 8984687500*p**5*q*r**3*s**3 - 120070312500*p**2*q**3*r**3*s**3 + 57343750000*p**3*q*r**4*s**3 + 9500000000*q**3*r**4*s**3 - 342875000000*p*q*r**5*s**3 + 400781250*p**10*s**4 + 8531250000*p**7*q**2*s**4 + 34033203125*p**4*q**4*s**4 + 42724609375*p*q**6*s**4 - 6289453125*p**8*r*s**4 - 24037109375*p**5*q**2*r*s**4 - 62626953125*p**2*q**4*r*s**4 + 17299218750*p**6*r**2*s**4 + 108357421875*p**3*q**2*r**2*s**4 - 55380859375*q**4*r**2*s**4 + 105648437500*p**4*r**3*s**4 + 1204228515625*p*q**2*r**3*s**4 - 365000000000*p**2*r**4*s**4 + 184375000000*r**5*s**4 - 32080078125*p**6*q*s**5 - 98144531250*p**3*q**3*s**5 + 93994140625*q**5*s**5 - 178955078125*p**4*q*r*s**5 - 1299804687500*p*q**3*r*s**5 + 332421875000*p**2*q*r**2*s**5 - 1195312500000*q*r**3*s**5 + 72021484375*p**5*s**6 + 323486328125*p**2*q**2*s**6 + 682373046875*p**3*r*s**6 + 2447509765625*q**2*r*s**6 - 3011474609375*p*r**2*s**6 + 3051757812500*p*q*s**7 - 7629394531250*s**8 + + b[3][4] = 1500*p**9*q**6 + 69625*p**6*q**8 + 590375*p**3*q**10 + 1035000*q**12 - 13500*p**10*q**4*r - 760625*p**7*q**6*r - 7904500*p**4*q**8*r - 18169250*p*q**10*r + 30375*p**11*q**2*r**2 + 2628625*p**8*q**4*r**2 + 37879000*p**5*q**6*r**2 + 121367500*p**2*q**8*r**2 - 2699250*p**9*q**2*r**3 - 76776875*p**6*q**4*r**3 - 403583125*p**3*q**6*r**3 - 78865625*q**8*r**3 + 60907500*p**7*q**2*r**4 + 735291250*p**4*q**4*r**4 + 781142500*p*q**6*r**4 - 558270000*p**5*q**2*r**5 - 2150725000*p**2*q**4*r**5 + 2015400000*p**3*q**2*r**6 + 1181000000*q**4*r**6 - 2220000000*p*q**2*r**7 + 40500*p**11*q**3*s + 1376500*p**8*q**5*s + 9953125*p**5*q**7*s + 9765625*p**2*q**9*s - 182250*p**12*q*r*s - 8859000*p**9*q**3*r*s - 82854500*p**6*q**5*r*s - 71511250*p**3*q**7*r*s + 273631250*q**9*r*s + 10233000*p**10*q*r**2*s + 179627500*p**7*q**3*r**2*s + 25164375*p**4*q**5*r**2*s - 2927290625*p*q**7*r**2*s - 171305000*p**8*q*r**3*s - 544768750*p**5*q**3*r**3*s + 7583437500*p**2*q**5*r**3*s + 1139860000*p**6*q*r**4*s - 6489375000*p**3*q**3*r**4*s - 9625375000*q**5*r**4*s - 1838000000*p**4*q*r**5*s + 19835000000*p*q**3*r**5*s - 3240000000*p**2*q*r**6*s + 273375*p**13*s**2 + 9753750*p**10*q**2*s**2 + 82575000*p**7*q**4*s**2 + 202265625*p**4*q**6*s**2 + 556093750*p*q**8*s**2 - 11552625*p**11*r*s**2 - 115813125*p**8*q**2*r*s**2 + 630590625*p**5*q**4*r*s**2 + 1347015625*p**2*q**6*r*s**2 + 157578750*p**9*r**2*s**2 - 689206250*p**6*q**2*r**2*s**2 - 4299609375*p**3*q**4*r**2*s**2 + 23896171875*q**6*r**2*s**2 - 1022437500*p**7*r**3*s**2 + 6648125000*p**4*q**2*r**3*s**2 - 52895312500*p*q**4*r**3*s**2 + 4401750000*p**5*r**4*s**2 + 26500000000*p**2*q**2*r**4*s**2 - 22125000000*p**3*r**5*s**2 - 1500000000*q**2*r**5*s**2 + 55500000000*p*r**6*s**2 - 137109375*p**9*q*s**3 - 1955937500*p**6*q**3*s**3 - 6790234375*p**3*q**5*s**3 - 16996093750*q**7*s**3 + 2146218750*p**7*q*r*s**3 + 6570312500*p**4*q**3*r*s**3 + 39918750000*p*q**5*r*s**3 - 7673281250*p**5*q*r**2*s**3 - 52000000000*p**2*q**3*r**2*s**3 + 50796875000*p**3*q*r**3*s**3 + 18750000000*q**3*r**3*s**3 - 399875000000*p*q*r**4*s**3 + 780468750*p**8*s**4 + 14455078125*p**5*q**2*s**4 + 10048828125*p**2*q**4*s**4 - 15113671875*p**6*r*s**4 + 39298828125*p**3*q**2*r*s**4 - 52138671875*q**4*r*s**4 + 45964843750*p**4*r**2*s**4 + 914414062500*p*q**2*r**2*s**4 + 1953125000*p**2*r**3*s**4 + 334375000000*r**4*s**4 - 149169921875*p**4*q*s**5 - 459716796875*p*q**3*s**5 - 325585937500*p**2*q*r*s**5 - 1462890625000*q*r**2*s**5 + 296630859375*p**3*s**6 + 1324462890625*q**2*s**6 + 307617187500*p*r*s**6 + + b[3][3] = -20750*p**7*q**6 - 290125*p**4*q**8 - 993000*p*q**10 + 146125*p**8*q**4*r + 2721500*p**5*q**6*r + 11833750*p**2*q**8*r - 237375*p**9*q**2*r**2 - 8167500*p**6*q**4*r**2 - 54605625*p**3*q**6*r**2 - 23802500*q**8*r**2 + 8927500*p**7*q**2*r**3 + 131184375*p**4*q**4*r**3 + 254695000*p*q**6*r**3 - 121561250*p**5*q**2*r**4 - 728003125*p**2*q**4*r**4 + 702550000*p**3*q**2*r**5 + 597312500*q**4*r**5 - 1202500000*p*q**2*r**6 - 194625*p**9*q**3*s - 1568875*p**6*q**5*s + 9685625*p**3*q**7*s + 74662500*q**9*s + 327375*p**10*q*r*s + 1280000*p**7*q**3*r*s - 123703750*p**4*q**5*r*s - 850121875*p*q**7*r*s - 7436250*p**8*q*r**2*s + 164820000*p**5*q**3*r**2*s + 2336659375*p**2*q**5*r**2*s + 32202500*p**6*q*r**3*s - 2429765625*p**3*q**3*r**3*s - 4318609375*q**5*r**3*s + 148000000*p**4*q*r**4*s + 9902812500*p*q**3*r**4*s - 1755000000*p**2*q*r**5*s + 1154250*p**11*s**2 + 36821250*p**8*q**2*s**2 + 372825000*p**5*q**4*s**2 + 1170921875*p**2*q**6*s**2 - 38913750*p**9*r*s**2 - 797071875*p**6*q**2*r*s**2 - 2848984375*p**3*q**4*r*s**2 + 7651406250*q**6*r*s**2 + 415068750*p**7*r**2*s**2 + 3151328125*p**4*q**2*r**2*s**2 - 17696875000*p*q**4*r**2*s**2 - 725968750*p**5*r**3*s**2 + 5295312500*p**2*q**2*r**3*s**2 - 8581250000*p**3*r**4*s**2 - 812500000*q**2*r**4*s**2 + 30062500000*p*r**5*s**2 - 110109375*p**7*q*s**3 - 1976562500*p**4*q**3*s**3 - 6329296875*p*q**5*s**3 + 2256328125*p**5*q*r*s**3 + 8554687500*p**2*q**3*r*s**3 + 12947265625*p**3*q*r**2*s**3 + 7984375000*q**3*r**2*s**3 - 167039062500*p*q*r**3*s**3 + 1181250000*p**6*s**4 + 17873046875*p**3*q**2*s**4 - 20449218750*q**4*s**4 - 16265625000*p**4*r*s**4 + 260869140625*p*q**2*r*s**4 + 21025390625*p**2*r**2*s**4 + 207617187500*r**3*s**4 - 207177734375*p**2*q*s**5 - 615478515625*q*r*s**5 + 301513671875*p*s**6 + + b[3][2] = 53125*p**5*q**6 + 425000*p**2*q**8 - 394375*p**6*q**4*r - 4301875*p**3*q**6*r - 3225000*q**8*r + 851250*p**7*q**2*r**2 + 16910625*p**4*q**4*r**2 + 44210000*p*q**6*r**2 - 20474375*p**5*q**2*r**3 - 147190625*p**2*q**4*r**3 + 163975000*p**3*q**2*r**4 + 156812500*q**4*r**4 - 323750000*p*q**2*r**5 - 99375*p**7*q**3*s - 6395000*p**4*q**5*s - 49243750*p*q**7*s - 1164375*p**8*q*r*s + 4465625*p**5*q**3*r*s + 205546875*p**2*q**5*r*s + 12163750*p**6*q*r**2*s - 315546875*p**3*q**3*r**2*s - 946453125*q**5*r**2*s - 23500000*p**4*q*r**3*s + 2313437500*p*q**3*r**3*s - 472500000*p**2*q*r**4*s + 1316250*p**9*s**2 + 22715625*p**6*q**2*s**2 + 206953125*p**3*q**4*s**2 + 1220000000*q**6*s**2 - 20953125*p**7*r*s**2 - 277656250*p**4*q**2*r*s**2 - 3317187500*p*q**4*r*s**2 + 293734375*p**5*r**2*s**2 + 1351562500*p**2*q**2*r**2*s**2 - 2278125000*p**3*r**3*s**2 - 218750000*q**2*r**3*s**2 + 8093750000*p*r**4*s**2 - 9609375*p**5*q*s**3 + 240234375*p**2*q**3*s**3 + 2310546875*p**3*q*r*s**3 + 1171875000*q**3*r*s**3 - 33460937500*p*q*r**2*s**3 + 2185546875*p**4*s**4 + 32578125000*p*q**2*s**4 - 8544921875*p**2*r*s**4 + 58398437500*r**2*s**4 - 114013671875*q*s**5 + + b[3][1] = -16250*p**6*q**4 - 191875*p**3*q**6 - 495000*q**8 + 73125*p**7*q**2*r + 1437500*p**4*q**4*r + 5866250*p*q**6*r - 2043125*p**5*q**2*r**2 - 17218750*p**2*q**4*r**2 + 19106250*p**3*q**2*r**3 + 34015625*q**4*r**3 - 69375000*p*q**2*r**4 - 219375*p**8*q*s - 2846250*p**5*q**3*s - 8021875*p**2*q**5*s + 3420000*p**6*q*r*s - 1640625*p**3*q**3*r*s - 152468750*q**5*r*s + 3062500*p**4*q*r**2*s + 381171875*p*q**3*r**2*s - 101250000*p**2*q*r**3*s + 2784375*p**7*s**2 + 43515625*p**4*q**2*s**2 + 115625000*p*q**4*s**2 - 48140625*p**5*r*s**2 - 307421875*p**2*q**2*r*s**2 - 25781250*p**3*r**2*s**2 - 46875000*q**2*r**2*s**2 + 1734375000*p*r**3*s**2 - 128906250*p**3*q*s**3 + 339843750*q**3*s**3 - 4583984375*p*q*r*s**3 + 2236328125*p**2*s**4 + 12255859375*r*s**4 + + b[3][0] = 31875*p**4*q**4 + 255000*p*q**6 - 82500*p**5*q**2*r - 1106250*p**2*q**4*r + 1653125*p**3*q**2*r**2 + 5187500*q**4*r**2 - 11562500*p*q**2*r**3 - 118125*p**6*q*s - 3593750*p**3*q**3*s - 23812500*q**5*s + 4656250*p**4*q*r*s + 67109375*p*q**3*r*s - 16875000*p**2*q*r**2*s - 984375*p**5*s**2 - 19531250*p**2*q**2*s**2 - 37890625*p**3*r*s**2 - 7812500*q**2*r*s**2 + 289062500*p*r**2*s**2 - 529296875*p*q*s**3 + 2343750000*s**4 + + b[4][5] = 600*p**10*q**10 + 13850*p**7*q**12 + 106150*p**4*q**14 + 270000*p*q**16 - 9300*p**11*q**8*r - 234075*p**8*q**10*r - 1942825*p**5*q**12*r - 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23582031250*p**5*q*r**2*s**5 + 202441406250*p**2*q**3*r**2*s**5 - 383203125000*p**3*q*r**3*s**5 + 2232910156250*q**3*r**3*s**5 + 1500000000000*p*q*r**4*s**5 - 13710937500*p**8*s**6 - 202832031250*p**5*q**2*s**6 - 531738281250*p**2*q**4*s**6 + 73330078125*p**6*r*s**6 - 3906250000*p**3*q**2*r*s**6 - 1275878906250*q**4*r*s**6 - 121093750000*p**4*r**2*s**6 - 3308593750000*p*q**2*r**2*s**6 + 18066406250*p**2*r**3*s**6 - 244140625000*r**4*s**6 + 327148437500*p**4*q*s**7 + 1672363281250*p*q**3*s**7 + 446777343750*p**2*q*r*s**7 + 1232910156250*q*r**2*s**7 - 274658203125*p**3*s**8 - 1068115234375*q**2*s**8 - 61035156250*p*r*s**8 + + b[4][3] = 200*p**9*q**8 + 7550*p**6*q**10 + 78650*p**3*q**12 + 248400*q**14 - 4800*p**10*q**6*r - 164300*p**7*q**8*r - 1709575*p**4*q**10*r - 5566500*p*q**12*r + 31050*p**11*q**4*r**2 + 1116175*p**8*q**6*r**2 + 12674650*p**5*q**8*r**2 + 45333850*p**2*q**10*r**2 - 60750*p**12*q**2*r**3 - 2872725*p**9*q**4*r**3 - 40403050*p**6*q**6*r**3 - 173564375*p**3*q**8*r**3 - 11242250*q**10*r**3 + 2174100*p**10*q**2*r**4 + 54010000*p**7*q**4*r**4 + 331074875*p**4*q**6*r**4 + 114173750*p*q**8*r**4 - 24858500*p**8*q**2*r**5 - 300875000*p**5*q**4*r**5 - 319430625*p**2*q**6*r**5 + 69810000*p**6*q**2*r**6 - 23900000*p**3*q**4*r**6 - 294662500*q**6*r**6 + 524200000*p**4*q**2*r**7 + 1432000000*p*q**4*r**7 - 2340000000*p**2*q**2*r**8 + 5400*p**11*q**5*s + 310400*p**8*q**7*s + 3591725*p**5*q**9*s + 11556750*p**2*q**11*s - 105300*p**12*q**3*r*s - 4234650*p**9*q**5*r*s - 49928875*p**6*q**7*r*s - 174078125*p**3*q**9*r*s + 18000000*q**11*r*s + 364500*p**13*q*r**2*s + 15763050*p**10*q**3*r**2*s + 220187400*p**7*q**5*r**2*s + 929609375*p**4*q**7*r**2*s - 43653125*p*q**9*r**2*s - 13427100*p**11*q*r**3*s - 346066250*p**8*q**3*r**3*s - 2287673375*p**5*q**5*r**3*s - 1403903125*p**2*q**7*r**3*s + 184586000*p**9*q*r**4*s + 2983460000*p**6*q**3*r**4*s + 8725818750*p**3*q**5*r**4*s + 2527734375*q**7*r**4*s - 1284480000*p**7*q*r**5*s - 13138250000*p**4*q**3*r**5*s - 14001625000*p*q**5*r**5*s + 4224800000*p**5*q*r**6*s + 27460000000*p**2*q**3*r**6*s - 3760000000*p**3*q*r**7*s + 3900000000*q**3*r**7*s + 36450*p**13*q**2*s**2 + 2765475*p**10*q**4*s**2 + 34027625*p**7*q**6*s**2 + 97375000*p**4*q**8*s**2 - 88275000*p*q**10*s**2 - 546750*p**14*r*s**2 - 21961125*p**11*q**2*r*s**2 - 273059375*p**8*q**4*r*s**2 - 761562500*p**5*q**6*r*s**2 + 1869656250*p**2*q**8*r*s**2 + 20545650*p**12*r**2*s**2 + 473934375*p**9*q**2*r**2*s**2 + 1758053125*p**6*q**4*r**2*s**2 - 8743359375*p**3*q**6*r**2*s**2 - 4154375000*q**8*r**2*s**2 - 296559000*p**10*r**3*s**2 - 4065056250*p**7*q**2*r**3*s**2 - 186328125*p**4*q**4*r**3*s**2 + 19419453125*p*q**6*r**3*s**2 + 2326262500*p**8*r**4*s**2 + 21189375000*p**5*q**2*r**4*s**2 - 26301953125*p**2*q**4*r**4*s**2 - 10513250000*p**6*r**5*s**2 - 69937500000*p**3*q**2*r**5*s**2 - 42257812500*q**4*r**5*s**2 + 23375000000*p**4*r**6*s**2 + 40750000000*p*q**2*r**6*s**2 - 19500000000*p**2*r**7*s**2 + 4009500*p**12*q*s**3 + 36140625*p**9*q**3*s**3 - 335459375*p**6*q**5*s**3 - 2695312500*p**3*q**7*s**3 - 1486250000*q**9*s**3 + 102515625*p**10*q*r*s**3 + 4006812500*p**7*q**3*r*s**3 + 27589609375*p**4*q**5*r*s**3 + 20195312500*p*q**7*r*s**3 - 2792812500*p**8*q*r**2*s**3 - 44115156250*p**5*q**3*r**2*s**3 - 72609453125*p**2*q**5*r**2*s**3 + 18752500000*p**6*q*r**3*s**3 + 218140625000*p**3*q**3*r**3*s**3 + 109940234375*q**5*r**3*s**3 - 21893750000*p**4*q*r**4*s**3 - 65187500000*p*q**3*r**4*s**3 - 31000000000*p**2*q*r**5*s**3 + 97500000000*q*r**6*s**3 - 86568750*p**11*s**4 - 1955390625*p**8*q**2*s**4 - 8960781250*p**5*q**4*s**4 - 1357812500*p**2*q**6*s**4 + 1657968750*p**9*r*s**4 + 10467187500*p**6*q**2*r*s**4 - 55292968750*p**3*q**4*r*s**4 - 60683593750*q**6*r*s**4 - 11473593750*p**7*r**2*s**4 - 123281250000*p**4*q**2*r**2*s**4 - 164912109375*p*q**4*r**2*s**4 + 13150000000*p**5*r**3*s**4 + 190751953125*p**2*q**2*r**3*s**4 + 61875000000*p**3*r**4*s**4 - 467773437500*q**2*r**4*s**4 - 118750000000*p*r**5*s**4 + 7583203125*p**7*q*s**5 + 54638671875*p**4*q**3*s**5 + 39423828125*p*q**5*s**5 + 32392578125*p**5*q*r*s**5 + 278515625000*p**2*q**3*r*s**5 - 298339843750*p**3*q*r**2*s**5 + 560791015625*q**3*r**2*s**5 + 720703125000*p*q*r**3*s**5 - 19687500000*p**6*s**6 - 159667968750*p**3*q**2*s**6 - 72265625000*q**4*s**6 + 116699218750*p**4*r*s**6 - 924072265625*p*q**2*r*s**6 - 156005859375*p**2*r**2*s**6 - 112304687500*r**3*s**6 + 349121093750*p**2*q*s**7 + 396728515625*q*r*s**7 - 213623046875*p*s**8 + + b[4][2] = -600*p**10*q**6 - 18450*p**7*q**8 - 174000*p**4*q**10 - 518400*p*q**12 + 5400*p**11*q**4*r + 197550*p**8*q**6*r + 2147775*p**5*q**8*r + 7219800*p**2*q**10*r - 12150*p**12*q**2*r**2 - 662200*p**9*q**4*r**2 - 9274775*p**6*q**6*r**2 - 38330625*p**3*q**8*r**2 - 5508000*q**10*r**2 + 656550*p**10*q**2*r**3 + 16233750*p**7*q**4*r**3 + 97335875*p**4*q**6*r**3 + 58271250*p*q**8*r**3 - 9845500*p**8*q**2*r**4 - 119464375*p**5*q**4*r**4 - 194431875*p**2*q**6*r**4 + 49465000*p**6*q**2*r**5 + 166000000*p**3*q**4*r**5 - 80793750*q**6*r**5 + 54400000*p**4*q**2*r**6 + 377750000*p*q**4*r**6 - 630000000*p**2*q**2*r**7 - 16200*p**12*q**3*s - 459300*p**9*q**5*s - 4207225*p**6*q**7*s - 10827500*p**3*q**9*s + 13635000*q**11*s + 72900*p**13*q*r*s + 2877300*p**10*q**3*r*s + 33239700*p**7*q**5*r*s + 107080625*p**4*q**7*r*s - 114975000*p*q**9*r*s - 3601800*p**11*q*r**2*s - 75214375*p**8*q**3*r**2*s - 387073250*p**5*q**5*r**2*s + 55540625*p**2*q**7*r**2*s + 53793000*p**9*q*r**3*s + 687176875*p**6*q**3*r**3*s + 1670018750*p**3*q**5*r**3*s + 665234375*q**7*r**3*s - 391570000*p**7*q*r**4*s - 3420125000*p**4*q**3*r**4*s - 3609625000*p*q**5*r**4*s + 1365600000*p**5*q*r**5*s + 7236250000*p**2*q**3*r**5*s - 1220000000*p**3*q*r**6*s + 1050000000*q**3*r**6*s - 109350*p**14*s**2 - 3065850*p**11*q**2*s**2 - 26908125*p**8*q**4*s**2 - 44606875*p**5*q**6*s**2 + 269812500*p**2*q**8*s**2 + 5200200*p**12*r*s**2 + 81826875*p**9*q**2*r*s**2 + 155378125*p**6*q**4*r*s**2 - 1936203125*p**3*q**6*r*s**2 - 998437500*q**8*r*s**2 - 77145750*p**10*r**2*s**2 - 745528125*p**7*q**2*r**2*s**2 + 683437500*p**4*q**4*r**2*s**2 + 4083359375*p*q**6*r**2*s**2 + 593287500*p**8*r**3*s**2 + 4799375000*p**5*q**2*r**3*s**2 - 4167578125*p**2*q**4*r**3*s**2 - 2731125000*p**6*r**4*s**2 - 18668750000*p**3*q**2*r**4*s**2 - 10480468750*q**4*r**4*s**2 + 6200000000*p**4*r**5*s**2 + 11750000000*p*q**2*r**5*s**2 - 5250000000*p**2*r**6*s**2 + 26527500*p**10*q*s**3 + 526031250*p**7*q**3*s**3 + 3160703125*p**4*q**5*s**3 + 2650312500*p*q**7*s**3 - 448031250*p**8*q*r*s**3 - 6682968750*p**5*q**3*r*s**3 - 11642812500*p**2*q**5*r*s**3 + 2553203125*p**6*q*r**2*s**3 + 37234375000*p**3*q**3*r**2*s**3 + 21871484375*q**5*r**2*s**3 + 2803125000*p**4*q*r**3*s**3 - 10796875000*p*q**3*r**3*s**3 - 16656250000*p**2*q*r**4*s**3 + 26250000000*q*r**5*s**3 - 75937500*p**9*s**4 - 704062500*p**6*q**2*s**4 - 8363281250*p**3*q**4*s**4 - 10398437500*q**6*s**4 + 197578125*p**7*r*s**4 - 16441406250*p**4*q**2*r*s**4 - 24277343750*p*q**4*r*s**4 - 5716015625*p**5*r**2*s**4 + 31728515625*p**2*q**2*r**2*s**4 + 27031250000*p**3*r**3*s**4 - 92285156250*q**2*r**3*s**4 - 33593750000*p*r**4*s**4 + 10394531250*p**5*q*s**5 + 38037109375*p**2*q**3*s**5 - 48144531250*p**3*q*r*s**5 + 74462890625*q**3*r*s**5 + 121093750000*p*q*r**2*s**5 - 2197265625*p**4*s**6 - 92529296875*p*q**2*s**6 + 15380859375*p**2*r*s**6 - 31738281250*r**2*s**6 + 54931640625*q*s**7 + + b[4][1] = 200*p**8*q**6 + 2950*p**5*q**8 + 10800*p**2*q**10 - 1800*p**9*q**4*r - 49650*p**6*q**6*r - 403375*p**3*q**8*r - 999000*q**10*r + 4050*p**10*q**2*r**2 + 236625*p**7*q**4*r**2 + 3109500*p**4*q**6*r**2 + 11463750*p*q**8*r**2 - 331500*p**8*q**2*r**3 - 7818125*p**5*q**4*r**3 - 41411250*p**2*q**6*r**3 + 4782500*p**6*q**2*r**4 + 47475000*p**3*q**4*r**4 - 16728125*q**6*r**4 - 8700000*p**4*q**2*r**5 + 81750000*p*q**4*r**5 - 135000000*p**2*q**2*r**6 + 5400*p**10*q**3*s + 144200*p**7*q**5*s + 939375*p**4*q**7*s + 1012500*p*q**9*s - 24300*p**11*q*r*s - 1169250*p**8*q**3*r*s - 14027250*p**5*q**5*r*s - 44446875*p**2*q**7*r*s + 2011500*p**9*q*r**2*s + 49330625*p**6*q**3*r**2*s + 272009375*p**3*q**5*r**2*s + 104062500*q**7*r**2*s - 34660000*p**7*q*r**3*s - 455062500*p**4*q**3*r**3*s - 625906250*p*q**5*r**3*s + 210200000*p**5*q*r**4*s + 1298750000*p**2*q**3*r**4*s - 240000000*p**3*q*r**5*s + 225000000*q**3*r**5*s + 36450*p**12*s**2 + 1231875*p**9*q**2*s**2 + 10712500*p**6*q**4*s**2 + 21718750*p**3*q**6*s**2 + 16875000*q**8*s**2 - 2814750*p**10*r*s**2 - 67612500*p**7*q**2*r*s**2 - 345156250*p**4*q**4*r*s**2 - 283125000*p*q**6*r*s**2 + 51300000*p**8*r**2*s**2 + 734531250*p**5*q**2*r**2*s**2 + 1267187500*p**2*q**4*r**2*s**2 - 384312500*p**6*r**3*s**2 - 3912500000*p**3*q**2*r**3*s**2 - 1822265625*q**4*r**3*s**2 + 1112500000*p**4*r**4*s**2 + 2437500000*p*q**2*r**4*s**2 - 1125000000*p**2*r**5*s**2 - 72578125*p**5*q**3*s**3 - 189296875*p**2*q**5*s**3 + 127265625*p**6*q*r*s**3 + 1415625000*p**3*q**3*r*s**3 + 1229687500*q**5*r*s**3 + 1448437500*p**4*q*r**2*s**3 + 2218750000*p*q**3*r**2*s**3 - 4031250000*p**2*q*r**3*s**3 + 5625000000*q*r**4*s**3 - 132890625*p**7*s**4 - 529296875*p**4*q**2*s**4 - 175781250*p*q**4*s**4 - 401953125*p**5*r*s**4 - 4482421875*p**2*q**2*r*s**4 + 4140625000*p**3*r**2*s**4 - 10498046875*q**2*r**2*s**4 - 7031250000*p*r**3*s**4 + 1220703125*p**3*q*s**5 + 1953125000*q**3*s**5 + 14160156250*p*q*r*s**5 - 1708984375*p**2*s**6 - 3662109375*r*s**6 + + b[4][0] = -4600*p**6*q**6 - 67850*p**3*q**8 - 248400*q**10 + 38900*p**7*q**4*r + 679575*p**4*q**6*r + 2866500*p*q**8*r - 81900*p**8*q**2*r**2 - 2009750*p**5*q**4*r**2 - 10783750*p**2*q**6*r**2 + 1478750*p**6*q**2*r**3 + 14165625*p**3*q**4*r**3 - 2743750*q**6*r**3 - 5450000*p**4*q**2*r**4 + 12687500*p*q**4*r**4 - 22500000*p**2*q**2*r**5 - 101700*p**8*q**3*s - 1700975*p**5*q**5*s - 7061250*p**2*q**7*s + 423900*p**9*q*r*s + 9292375*p**6*q**3*r*s + 50438750*p**3*q**5*r*s + 20475000*q**7*r*s - 7852500*p**7*q*r**2*s - 87765625*p**4*q**3*r**2*s - 121609375*p*q**5*r**2*s + 47700000*p**5*q*r**3*s + 264687500*p**2*q**3*r**3*s - 65000000*p**3*q*r**4*s + 37500000*q**3*r**4*s - 534600*p**10*s**2 - 10344375*p**7*q**2*s**2 - 54859375*p**4*q**4*s**2 - 40312500*p*q**6*s**2 + 10158750*p**8*r*s**2 + 117778125*p**5*q**2*r*s**2 + 192421875*p**2*q**4*r*s**2 - 70593750*p**6*r**2*s**2 - 685312500*p**3*q**2*r**2*s**2 - 334375000*q**4*r**2*s**2 + 193750000*p**4*r**3*s**2 + 500000000*p*q**2*r**3*s**2 - 187500000*p**2*r**4*s**2 + 8437500*p**6*q*s**3 + 159218750*p**3*q**3*s**3 + 220625000*q**5*s**3 + 353828125*p**4*q*r*s**3 + 412500000*p*q**3*r*s**3 - 1023437500*p**2*q*r**2*s**3 + 937500000*q*r**3*s**3 - 206015625*p**5*s**4 - 701171875*p**2*q**2*s**4 + 998046875*p**3*r*s**4 - 1308593750*q**2*r*s**4 - 1367187500*p*r**2*s**4 + 1708984375*p*q*s**5 - 976562500*s**6 + + return b + + @property + def o(self): + p, q, r, s = self.p, self.q, self.r, self.s + o = [0]*6 + + o[5] = -1600*p**10*q**10 - 23600*p**7*q**12 - 86400*p**4*q**14 + 24800*p**11*q**8*r + 419200*p**8*q**10*r + 1850450*p**5*q**12*r + 896400*p**2*q**14*r - 138800*p**12*q**6*r**2 - 2921900*p**9*q**8*r**2 - 17295200*p**6*q**10*r**2 - 27127750*p**3*q**12*r**2 - 26076600*q**14*r**2 + 325800*p**13*q**4*r**3 + 9993850*p**10*q**6*r**3 + 88010500*p**7*q**8*r**3 + 274047650*p**4*q**10*r**3 + 410171400*p*q**12*r**3 - 259200*p**14*q**2*r**4 - 17147100*p**11*q**4*r**4 - 254289150*p**8*q**6*r**4 - 1318548225*p**5*q**8*r**4 - 2633598475*p**2*q**10*r**4 + 12636000*p**12*q**2*r**5 + 388911000*p**9*q**4*r**5 + 3269704725*p**6*q**6*r**5 + 8791192300*p**3*q**8*r**5 + 93560575*q**10*r**5 - 228361600*p**10*q**2*r**6 - 3951199200*p**7*q**4*r**6 - 16276981100*p**4*q**6*r**6 - 1597227000*p*q**8*r**6 + 1947899200*p**8*q**2*r**7 + 17037648000*p**5*q**4*r**7 + 8919740000*p**2*q**6*r**7 - 7672160000*p**6*q**2*r**8 - 15496000000*p**3*q**4*r**8 + 4224000000*q**6*r**8 + 9968000000*p**4*q**2*r**9 - 8640000000*p*q**4*r**9 + 4800000000*p**2*q**2*r**10 - 55200*p**12*q**7*s - 685600*p**9*q**9*s + 1028250*p**6*q**11*s + 37650000*p**3*q**13*s + 111375000*q**15*s + 583200*p**13*q**5*r*s + 9075600*p**10*q**7*r*s - 883150*p**7*q**9*r*s - 506830750*p**4*q**11*r*s - 1793137500*p*q**13*r*s - 1852200*p**14*q**3*r**2*s - 41435250*p**11*q**5*r**2*s - 80566700*p**8*q**7*r**2*s + 2485673600*p**5*q**9*r**2*s + 11442286125*p**2*q**11*r**2*s + 1555200*p**15*q*r**3*s + 80846100*p**12*q**3*r**3*s + 564906800*p**9*q**5*r**3*s - 4493012400*p**6*q**7*r**3*s - 35492391250*p**3*q**9*r**3*s - 789931875*q**11*r**3*s - 71766000*p**13*q*r**4*s - 1551149200*p**10*q**3*r**4*s - 1773437900*p**7*q**5*r**4*s + 51957593125*p**4*q**7*r**4*s + 14964765625*p*q**9*r**4*s + 1231569600*p**11*q*r**5*s + 12042977600*p**8*q**3*r**5*s - 27151011200*p**5*q**5*r**5*s - 88080610000*p**2*q**7*r**5*s - 9912995200*p**9*q*r**6*s - 29448104000*p**6*q**3*r**6*s + 144954840000*p**3*q**5*r**6*s - 44601300000*q**7*r**6*s + 35453760000*p**7*q*r**7*s - 63264000000*p**4*q**3*r**7*s + 60544000000*p*q**5*r**7*s - 30048000000*p**5*q*r**8*s + 37040000000*p**2*q**3*r**8*s - 60800000000*p**3*q*r**9*s - 48000000000*q**3*r**9*s - 615600*p**14*q**4*s**2 - 10524500*p**11*q**6*s**2 - 33831250*p**8*q**8*s**2 + 222806250*p**5*q**10*s**2 + 1099687500*p**2*q**12*s**2 + 3353400*p**15*q**2*r*s**2 + 74269350*p**12*q**4*r*s**2 + 276445750*p**9*q**6*r*s**2 - 2618600000*p**6*q**8*r*s**2 - 14473243750*p**3*q**10*r*s**2 + 1383750000*q**12*r*s**2 - 2332800*p**16*r**2*s**2 - 132750900*p**13*q**2*r**2*s**2 - 900775150*p**10*q**4*r**2*s**2 + 8249244500*p**7*q**6*r**2*s**2 + 59525796875*p**4*q**8*r**2*s**2 - 40292868750*p*q**10*r**2*s**2 + 128304000*p**14*r**3*s**2 + 3160232100*p**11*q**2*r**3*s**2 + 8329580000*p**8*q**4*r**3*s**2 - 45558458750*p**5*q**6*r**3*s**2 + 297252890625*p**2*q**8*r**3*s**2 - 2769854400*p**12*r**4*s**2 - 37065970000*p**9*q**2*r**4*s**2 - 90812546875*p**6*q**4*r**4*s**2 - 627902000000*p**3*q**6*r**4*s**2 + 181347421875*q**8*r**4*s**2 + 30946932800*p**10*r**5*s**2 + 249954680000*p**7*q**2*r**5*s**2 + 802954812500*p**4*q**4*r**5*s**2 - 80900000000*p*q**6*r**5*s**2 - 192137320000*p**8*r**6*s**2 - 932641600000*p**5*q**2*r**6*s**2 - 943242500000*p**2*q**4*r**6*s**2 + 658412000000*p**6*r**7*s**2 + 1930720000000*p**3*q**2*r**7*s**2 + 593800000000*q**4*r**7*s**2 - 1162800000000*p**4*r**8*s**2 - 280000000000*p*q**2*r**8*s**2 + 840000000000*p**2*r**9*s**2 - 2187000*p**16*q*s**3 - 47418750*p**13*q**3*s**3 - 180618750*p**10*q**5*s**3 + 2231250000*p**7*q**7*s**3 + 17857734375*p**4*q**9*s**3 + 29882812500*p*q**11*s**3 + 24664500*p**14*q*r*s**3 - 853368750*p**11*q**3*r*s**3 - 25939693750*p**8*q**5*r*s**3 - 177541562500*p**5*q**7*r*s**3 - 297978828125*p**2*q**9*r*s**3 - 153468000*p**12*q*r**2*s**3 + 30188125000*p**9*q**3*r**2*s**3 + 344049821875*p**6*q**5*r**2*s**3 + 534026875000*p**3*q**7*r**2*s**3 - 340726484375*q**9*r**2*s**3 - 9056190000*p**10*q*r**3*s**3 - 322314687500*p**7*q**3*r**3*s**3 - 769632109375*p**4*q**5*r**3*s**3 - 83276875000*p*q**7*r**3*s**3 + 164061000000*p**8*q*r**4*s**3 + 1381358750000*p**5*q**3*r**4*s**3 + 3088020000000*p**2*q**5*r**4*s**3 - 1267655000000*p**6*q*r**5*s**3 - 7642630000000*p**3*q**3*r**5*s**3 - 2759877500000*q**5*r**5*s**3 + 4597760000000*p**4*q*r**6*s**3 + 1846200000000*p*q**3*r**6*s**3 - 7006000000000*p**2*q*r**7*s**3 - 1200000000000*q*r**8*s**3 + 18225000*p**15*s**4 + 1328906250*p**12*q**2*s**4 + 24729140625*p**9*q**4*s**4 + 169467187500*p**6*q**6*s**4 + 413281250000*p**3*q**8*s**4 + 223828125000*q**10*s**4 + 710775000*p**13*r*s**4 - 18611015625*p**10*q**2*r*s**4 - 314344375000*p**7*q**4*r*s**4 - 828439843750*p**4*q**6*r*s**4 + 460937500000*p*q**8*r*s**4 - 25674975000*p**11*r**2*s**4 - 52223515625*p**8*q**2*r**2*s**4 - 387160000000*p**5*q**4*r**2*s**4 - 4733680078125*p**2*q**6*r**2*s**4 + 343911875000*p**9*r**3*s**4 + 3328658359375*p**6*q**2*r**3*s**4 + 16532406250000*p**3*q**4*r**3*s**4 + 5980613281250*q**6*r**3*s**4 - 2295497500000*p**7*r**4*s**4 - 14809820312500*p**4*q**2*r**4*s**4 - 6491406250000*p*q**4*r**4*s**4 + 7768470000000*p**5*r**5*s**4 + 34192562500000*p**2*q**2*r**5*s**4 - 11859000000000*p**3*r**6*s**4 + 10530000000000*q**2*r**6*s**4 + 6000000000000*p*r**7*s**4 + 11453906250*p**11*q*s**5 + 149765625000*p**8*q**3*s**5 + 545537109375*p**5*q**5*s**5 + 527343750000*p**2*q**7*s**5 - 371313281250*p**9*q*r*s**5 - 3461455078125*p**6*q**3*r*s**5 - 7920878906250*p**3*q**5*r*s**5 - 4747314453125*q**7*r*s**5 + 2417815625000*p**7*q*r**2*s**5 + 5465576171875*p**4*q**3*r**2*s**5 + 5937128906250*p*q**5*r**2*s**5 - 10661156250000*p**5*q*r**3*s**5 - 63574218750000*p**2*q**3*r**3*s**5 + 24059375000000*p**3*q*r**4*s**5 - 33023437500000*q**3*r**4*s**5 - 43125000000000*p*q*r**5*s**5 + 94394531250*p**10*s**6 + 1097167968750*p**7*q**2*s**6 + 2829833984375*p**4*q**4*s**6 - 1525878906250*p*q**6*s**6 + 2724609375*p**8*r*s**6 + 13998535156250*p**5*q**2*r*s**6 + 57094482421875*p**2*q**4*r*s**6 - 8512509765625*p**6*r**2*s**6 - 37941406250000*p**3*q**2*r**2*s**6 + 33191894531250*q**4*r**2*s**6 + 50534179687500*p**4*r**3*s**6 + 156656250000000*p*q**2*r**3*s**6 - 85023437500000*p**2*r**4*s**6 + 10125000000000*r**5*s**6 - 2717285156250*p**6*q*s**7 - 11352539062500*p**3*q**3*s**7 - 2593994140625*q**5*s**7 - 47154541015625*p**4*q*r*s**7 - 160644531250000*p*q**3*r*s**7 + 142500000000000*p**2*q*r**2*s**7 - 26757812500000*q*r**3*s**7 - 4364013671875*p**5*s**8 - 94604492187500*p**2*q**2*s**8 + 114379882812500*p**3*r*s**8 + 51116943359375*q**2*r*s**8 - 346435546875000*p*r**2*s**8 + 476837158203125*p*q*s**9 - 476837158203125*s**10 + + o[4] = 1600*p**11*q**8 + 20800*p**8*q**10 + 45100*p**5*q**12 - 151200*p**2*q**14 - 19200*p**12*q**6*r - 293200*p**9*q**8*r - 794600*p**6*q**10*r + 2634675*p**3*q**12*r + 2640600*q**14*r + 75600*p**13*q**4*r**2 + 1529100*p**10*q**6*r**2 + 6233350*p**7*q**8*r**2 - 12013350*p**4*q**10*r**2 - 29069550*p*q**12*r**2 - 97200*p**14*q**2*r**3 - 3562500*p**11*q**4*r**3 - 26984900*p**8*q**6*r**3 - 15900325*p**5*q**8*r**3 + 76267100*p**2*q**10*r**3 + 3272400*p**12*q**2*r**4 + 59486850*p**9*q**4*r**4 + 221270075*p**6*q**6*r**4 + 74065250*p**3*q**8*r**4 - 300564375*q**10*r**4 - 45569400*p**10*q**2*r**5 - 438666000*p**7*q**4*r**5 - 444821250*p**4*q**6*r**5 + 2448256250*p*q**8*r**5 + 290640000*p**8*q**2*r**6 + 855850000*p**5*q**4*r**6 - 5741875000*p**2*q**6*r**6 - 644000000*p**6*q**2*r**7 + 5574000000*p**3*q**4*r**7 + 4643000000*q**6*r**7 - 1696000000*p**4*q**2*r**8 - 12660000000*p*q**4*r**8 + 7200000000*p**2*q**2*r**9 + 43200*p**13*q**5*s + 572000*p**10*q**7*s - 59800*p**7*q**9*s - 24174625*p**4*q**11*s - 74587500*p*q**13*s - 324000*p**14*q**3*r*s - 5531400*p**11*q**5*r*s - 3712100*p**8*q**7*r*s + 293009275*p**5*q**9*r*s + 1115548875*p**2*q**11*r*s + 583200*p**15*q*r**2*s + 18343800*p**12*q**3*r**2*s + 77911100*p**9*q**5*r**2*s - 957488825*p**6*q**7*r**2*s - 5449661250*p**3*q**9*r**2*s + 960120000*q**11*r**2*s - 23684400*p**13*q*r**3*s - 373761900*p**10*q**3*r**3*s - 27944975*p**7*q**5*r**3*s + 10375740625*p**4*q**7*r**3*s - 4649093750*p*q**9*r**3*s + 395816400*p**11*q*r**4*s + 2910968000*p**8*q**3*r**4*s - 9126162500*p**5*q**5*r**4*s - 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708740234375*p**2*r*s**6 + 3901367187500*r**2*s**6 - 8050537109375*q*s**7 + + o[1] = 2800*p**8*q**6 + 41300*p**5*q**8 + 151200*p**2*q**10 - 25200*p**9*q**4*r - 542600*p**6*q**6*r - 3397875*p**3*q**8*r - 5751000*q**10*r + 56700*p**10*q**2*r**2 + 1972125*p**7*q**4*r**2 + 18624250*p**4*q**6*r**2 + 50253750*p*q**8*r**2 - 1701000*p**8*q**2*r**3 - 32630625*p**5*q**4*r**3 - 139868750*p**2*q**6*r**3 + 18162500*p**6*q**2*r**4 + 177125000*p**3*q**4*r**4 + 121734375*q**6*r**4 - 100500000*p**4*q**2*r**5 - 386250000*p*q**4*r**5 + 225000000*p**2*q**2*r**6 + 75600*p**10*q**3*s + 1708800*p**7*q**5*s + 12836875*p**4*q**7*s + 32062500*p*q**9*s - 340200*p**11*q*r*s - 10185750*p**8*q**3*r*s - 97502750*p**5*q**5*r*s - 301640625*p**2*q**7*r*s + 7168500*p**9*q*r**2*s + 135960625*p**6*q**3*r**2*s + 587471875*p**3*q**5*r**2*s - 384750000*q**7*r**2*s - 29325000*p**7*q*r**3*s - 320625000*p**4*q**3*r**3*s + 523437500*p*q**5*r**3*s - 42000000*p**5*q*r**4*s + 343750000*p**2*q**3*r**4*s + 150000000*p**3*q*r**5*s - 2250000000*q**3*r**5*s + 510300*p**12*s**2 + 12808125*p**9*q**2*s**2 + 107062500*p**6*q**4*s**2 + 270312500*p**3*q**6*s**2 - 168750000*q**8*s**2 - 2551500*p**10*r*s**2 - 5062500*p**7*q**2*r*s**2 + 712343750*p**4*q**4*r*s**2 + 4788281250*p*q**6*r*s**2 - 256837500*p**8*r**2*s**2 - 3574812500*p**5*q**2*r**2*s**2 - 14967968750*p**2*q**4*r**2*s**2 + 4040937500*p**6*r**3*s**2 + 26400000000*p**3*q**2*r**3*s**2 + 17083984375*q**4*r**3*s**2 - 21812500000*p**4*r**4*s**2 - 24375000000*p*q**2*r**4*s**2 + 39375000000*p**2*r**5*s**2 - 127265625*p**5*q**3*s**3 - 680234375*p**2*q**5*s**3 - 2048203125*p**6*q*r*s**3 - 18794531250*p**3*q**3*r*s**3 - 25050000000*q**5*r*s**3 + 26621875000*p**4*q*r**2*s**3 + 37007812500*p*q**3*r**2*s**3 - 105468750000*p**2*q*r**3*s**3 - 56250000000*q*r**4*s**3 + 1124296875*p**7*s**4 + 9251953125*p**4*q**2*s**4 - 8007812500*p*q**4*s**4 - 4004296875*p**5*r*s**4 + 179931640625*p**2*q**2*r*s**4 - 75703125000*p**3*r**2*s**4 + 133447265625*q**2*r**2*s**4 + 363281250000*p*r**3*s**4 - 91552734375*p**3*q*s**5 - 19531250000*q**3*s**5 - 751953125000*p*q*r*s**5 + 157958984375*p**2*s**6 + 748291015625*r*s**6 + + o[0] = -14400*p**6*q**6 - 212400*p**3*q**8 - 777600*q**10 + 92100*p**7*q**4*r + 1689675*p**4*q**6*r + 7371000*p*q**8*r - 122850*p**8*q**2*r**2 - 3735250*p**5*q**4*r**2 - 22432500*p**2*q**6*r**2 + 2298750*p**6*q**2*r**3 + 29390625*p**3*q**4*r**3 + 18000000*q**6*r**3 - 17750000*p**4*q**2*r**4 - 62812500*p*q**4*r**4 + 37500000*p**2*q**2*r**5 - 51300*p**8*q**3*s - 768025*p**5*q**5*s - 2801250*p**2*q**7*s - 275400*p**9*q*r*s - 5479875*p**6*q**3*r*s - 35538750*p**3*q**5*r*s - 68850000*q**7*r*s + 12757500*p**7*q*r**2*s + 133640625*p**4*q**3*r**2*s + 222609375*p*q**5*r**2*s - 108500000*p**5*q*r**3*s - 290312500*p**2*q**3*r**3*s + 275000000*p**3*q*r**4*s - 375000000*q**3*r**4*s + 1931850*p**10*s**2 + 40213125*p**7*q**2*s**2 + 253921875*p**4*q**4*s**2 + 464062500*p*q**6*s**2 - 71077500*p**8*r*s**2 - 818746875*p**5*q**2*r*s**2 - 1882265625*p**2*q**4*r*s**2 + 826031250*p**6*r**2*s**2 + 4369687500*p**3*q**2*r**2*s**2 + 3107812500*q**4*r**2*s**2 - 3943750000*p**4*r**3*s**2 - 5000000000*p*q**2*r**3*s**2 + 6562500000*p**2*r**4*s**2 - 295312500*p**6*q*s**3 - 2938906250*p**3*q**3*s**3 - 4848750000*q**5*s**3 + 3791484375*p**4*q*r*s**3 + 7556250000*p*q**3*r*s**3 - 11960937500*p**2*q*r**2*s**3 - 9375000000*q*r**3*s**3 + 1668515625*p**5*s**4 + 20447265625*p**2*q**2*s**4 - 21955078125*p**3*r*s**4 + 18984375000*q**2*r*s**4 + 67382812500*p*r**2*s**4 - 120849609375*p*q*s**5 + 157226562500*s**6 + + return o + + @property + def a(self): + p, q, r, s = self.p, self.q, self.r, self.s + a = [0]*6 + + a[5] = -100*p**7*q**7 - 2175*p**4*q**9 - 10500*p*q**11 + 1100*p**8*q**5*r + 27975*p**5*q**7*r + 152950*p**2*q**9*r - 4125*p**9*q**3*r**2 - 128875*p**6*q**5*r**2 - 830525*p**3*q**7*r**2 + 59450*q**9*r**2 + 5400*p**10*q*r**3 + 243800*p**7*q**3*r**3 + 2082650*p**4*q**5*r**3 - 333925*p*q**7*r**3 - 139200*p**8*q*r**4 - 2406000*p**5*q**3*r**4 - 122600*p**2*q**5*r**4 + 1254400*p**6*q*r**5 + 3776000*p**3*q**3*r**5 + 1832000*q**5*r**5 - 4736000*p**4*q*r**6 - 6720000*p*q**3*r**6 + 6400000*p**2*q*r**7 - 900*p**9*q**4*s - 37400*p**6*q**6*s - 281625*p**3*q**8*s - 435000*q**10*s + 6750*p**10*q**2*r*s + 322300*p**7*q**4*r*s + 2718575*p**4*q**6*r*s + 4214250*p*q**8*r*s - 16200*p**11*r**2*s - 859275*p**8*q**2*r**2*s - 8925475*p**5*q**4*r**2*s - 14427875*p**2*q**6*r**2*s + 453600*p**9*r**3*s + 10038400*p**6*q**2*r**3*s + 17397500*p**3*q**4*r**3*s - 11333125*q**6*r**3*s - 4451200*p**7*r**4*s - 15850000*p**4*q**2*r**4*s + 34000000*p*q**4*r**4*s + 17984000*p**5*r**5*s - 10000000*p**2*q**2*r**5*s - 25600000*p**3*r**6*s - 8000000*q**2*r**6*s + 6075*p**11*q*s**2 - 83250*p**8*q**3*s**2 - 1282500*p**5*q**5*s**2 - 2862500*p**2*q**7*s**2 + 724275*p**9*q*r*s**2 + 9807250*p**6*q**3*r*s**2 + 28374375*p**3*q**5*r*s**2 + 22212500*q**7*r*s**2 - 8982000*p**7*q*r**2*s**2 - 39600000*p**4*q**3*r**2*s**2 - 61746875*p*q**5*r**2*s**2 - 1010000*p**5*q*r**3*s**2 - 1000000*p**2*q**3*r**3*s**2 + 78000000*p**3*q*r**4*s**2 + 30000000*q**3*r**4*s**2 + 80000000*p*q*r**5*s**2 - 759375*p**10*s**3 - 9787500*p**7*q**2*s**3 - 39062500*p**4*q**4*s**3 - 52343750*p*q**6*s**3 + 12301875*p**8*r*s**3 + 98175000*p**5*q**2*r*s**3 + 225078125*p**2*q**4*r*s**3 - 54900000*p**6*r**2*s**3 - 310000000*p**3*q**2*r**2*s**3 - 7890625*q**4*r**2*s**3 + 51250000*p**4*r**3*s**3 - 420000000*p*q**2*r**3*s**3 + 110000000*p**2*r**4*s**3 - 200000000*r**5*s**3 + 2109375*p**6*q*s**4 - 21093750*p**3*q**3*s**4 - 89843750*q**5*s**4 + 182343750*p**4*q*r*s**4 + 733203125*p*q**3*r*s**4 - 196875000*p**2*q*r**2*s**4 + 1125000000*q*r**3*s**4 - 158203125*p**5*s**5 - 566406250*p**2*q**2*s**5 + 101562500*p**3*r*s**5 - 1669921875*q**2*r*s**5 + 1250000000*p*r**2*s**5 - 1220703125*p*q*s**6 + 6103515625*s**7 + + a[4] = 1000*p**5*q**7 + 7250*p**2*q**9 - 10800*p**6*q**5*r - 96900*p**3*q**7*r - 52500*q**9*r + 37400*p**7*q**3*r**2 + 470850*p**4*q**5*r**2 + 640600*p*q**7*r**2 - 39600*p**8*q*r**3 - 983600*p**5*q**3*r**3 - 2848100*p**2*q**5*r**3 + 814400*p**6*q*r**4 + 6076000*p**3*q**3*r**4 + 2308000*q**5*r**4 - 5024000*p**4*q*r**5 - 9680000*p*q**3*r**5 + 9600000*p**2*q*r**6 + 13800*p**7*q**4*s + 94650*p**4*q**6*s - 26500*p*q**8*s - 86400*p**8*q**2*r*s - 816500*p**5*q**4*r*s - 257500*p**2*q**6*r*s + 91800*p**9*r**2*s + 1853700*p**6*q**2*r**2*s + 630000*p**3*q**4*r**2*s - 8971250*q**6*r**2*s - 2071200*p**7*r**3*s - 7240000*p**4*q**2*r**3*s + 29375000*p*q**4*r**3*s + 14416000*p**5*r**4*s - 5200000*p**2*q**2*r**4*s - 30400000*p**3*r**5*s - 12000000*q**2*r**5*s + 64800*p**9*q*s**2 + 567000*p**6*q**3*s**2 + 1655000*p**3*q**5*s**2 + 6987500*q**7*s**2 + 337500*p**7*q*r*s**2 + 8462500*p**4*q**3*r*s**2 - 5812500*p*q**5*r*s**2 - 24930000*p**5*q*r**2*s**2 - 69125000*p**2*q**3*r**2*s**2 + 103500000*p**3*q*r**3*s**2 + 30000000*q**3*r**3*s**2 + 90000000*p*q*r**4*s**2 - 708750*p**8*s**3 - 5400000*p**5*q**2*s**3 + 8906250*p**2*q**4*s**3 + 18562500*p**6*r*s**3 - 625000*p**3*q**2*r*s**3 + 29687500*q**4*r*s**3 - 75000000*p**4*r**2*s**3 - 416250000*p*q**2*r**2*s**3 + 60000000*p**2*r**3*s**3 - 300000000*r**4*s**3 + 71718750*p**4*q*s**4 + 189062500*p*q**3*s**4 + 210937500*p**2*q*r*s**4 + 1187500000*q*r**2*s**4 - 187500000*p**3*s**5 - 800781250*q**2*s**5 - 390625000*p*r*s**5 + + a[3] = -500*p**6*q**5 - 6350*p**3*q**7 - 19800*q**9 + 3750*p**7*q**3*r + 65100*p**4*q**5*r + 264950*p*q**7*r - 6750*p**8*q*r**2 - 209050*p**5*q**3*r**2 - 1217250*p**2*q**5*r**2 + 219000*p**6*q*r**3 + 2510000*p**3*q**3*r**3 + 1098500*q**5*r**3 - 2068000*p**4*q*r**4 - 5060000*p*q**3*r**4 + 5200000*p**2*q*r**5 - 6750*p**8*q**2*s - 96350*p**5*q**4*s - 346000*p**2*q**6*s + 20250*p**9*r*s + 459900*p**6*q**2*r*s + 1828750*p**3*q**4*r*s - 2930000*q**6*r*s - 594000*p**7*r**2*s - 4301250*p**4*q**2*r**2*s + 10906250*p*q**4*r**2*s + 5252000*p**5*r**3*s - 1450000*p**2*q**2*r**3*s - 12800000*p**3*r**4*s - 6500000*q**2*r**4*s + 74250*p**7*q*s**2 + 1418750*p**4*q**3*s**2 + 5956250*p*q**5*s**2 - 4297500*p**5*q*r*s**2 - 29906250*p**2*q**3*r*s**2 + 31500000*p**3*q*r**2*s**2 + 12500000*q**3*r**2*s**2 + 35000000*p*q*r**3*s**2 + 1350000*p**6*s**3 + 6093750*p**3*q**2*s**3 + 17500000*q**4*s**3 - 7031250*p**4*r*s**3 - 127812500*p*q**2*r*s**3 + 18750000*p**2*r**2*s**3 - 162500000*r**3*s**3 + 107812500*p**2*q*s**4 + 460937500*q*r*s**4 - 214843750*p*s**5 + + a[2] = 1950*p**4*q**5 + 14100*p*q**7 - 14350*p**5*q**3*r - 125600*p**2*q**5*r + 27900*p**6*q*r**2 + 402250*p**3*q**3*r**2 + 288250*q**5*r**2 - 436000*p**4*q*r**3 - 1345000*p*q**3*r**3 + 1400000*p**2*q*r**4 + 9450*p**6*q**2*s - 1250*p**3*q**4*s - 465000*q**6*s - 49950*p**7*r*s - 302500*p**4*q**2*r*s + 1718750*p*q**4*r*s + 834000*p**5*r**2*s + 437500*p**2*q**2*r**2*s - 3100000*p**3*r**3*s - 1750000*q**2*r**3*s - 292500*p**5*q*s**2 - 1937500*p**2*q**3*s**2 + 3343750*p**3*q*r*s**2 + 1875000*q**3*r*s**2 + 8125000*p*q*r**2*s**2 - 1406250*p**4*s**3 - 12343750*p*q**2*s**3 + 5312500*p**2*r*s**3 - 43750000*r**2*s**3 + 74218750*q*s**4 + + a[1] = -300*p**5*q**3 - 2150*p**2*q**5 + 1350*p**6*q*r + 21500*p**3*q**3*r + 61500*q**5*r - 42000*p**4*q*r**2 - 290000*p*q**3*r**2 + 300000*p**2*q*r**3 - 4050*p**7*s - 45000*p**4*q**2*s - 125000*p*q**4*s + 108000*p**5*r*s + 643750*p**2*q**2*r*s - 700000*p**3*r**2*s - 375000*q**2*r**2*s - 93750*p**3*q*s**2 - 312500*q**3*s**2 + 1875000*p*q*r*s**2 - 1406250*p**2*s**3 - 9375000*r*s**3 + + a[0] = 1250*p**3*q**3 + 9000*q**5 - 4500*p**4*q*r - 46250*p*q**3*r + 50000*p**2*q*r**2 + 6750*p**5*s + 43750*p**2*q**2*s - 75000*p**3*r*s - 62500*q**2*r*s + 156250*p*q*s**2 - 1562500*s**3 + + return a + + @property + def c(self): + p, q, r, s = self.p, self.q, self.r, self.s + c = [0]*6 + + c[5] = -40*p**5*q**11 - 270*p**2*q**13 + 700*p**6*q**9*r + 5165*p**3*q**11*r + 540*q**13*r - 4230*p**7*q**7*r**2 - 31845*p**4*q**9*r**2 + 20880*p*q**11*r**2 + 9645*p**8*q**5*r**3 + 57615*p**5*q**7*r**3 - 358255*p**2*q**9*r**3 - 1880*p**9*q**3*r**4 + 114020*p**6*q**5*r**4 + 2012190*p**3*q**7*r**4 - 26855*q**9*r**4 - 14400*p**10*q*r**5 - 470400*p**7*q**3*r**5 - 5088640*p**4*q**5*r**5 + 920*p*q**7*r**5 + 332800*p**8*q*r**6 + 5797120*p**5*q**3*r**6 + 1608000*p**2*q**5*r**6 - 2611200*p**6*q*r**7 - 7424000*p**3*q**3*r**7 - 2323200*q**5*r**7 + 8601600*p**4*q*r**8 + 9472000*p*q**3*r**8 - 10240000*p**2*q*r**9 - 3060*p**7*q**8*s - 39085*p**4*q**10*s - 132300*p*q**12*s + 36580*p**8*q**6*r*s + 520185*p**5*q**8*r*s + 1969860*p**2*q**10*r*s - 144045*p**9*q**4*r**2*s - 2438425*p**6*q**6*r**2*s - 10809475*p**3*q**8*r**2*s + 518850*q**10*r**2*s + 182520*p**10*q**2*r**3*s + 4533930*p**7*q**4*r**3*s + 26196770*p**4*q**6*r**3*s - 4542325*p*q**8*r**3*s + 21600*p**11*r**4*s - 2208080*p**8*q**2*r**4*s - 24787960*p**5*q**4*r**4*s + 10813900*p**2*q**6*r**4*s - 499200*p**9*r**5*s + 3827840*p**6*q**2*r**5*s + 9596000*p**3*q**4*r**5*s + 22662000*q**6*r**5*s + 3916800*p**7*r**6*s - 29952000*p**4*q**2*r**6*s - 90800000*p*q**4*r**6*s - 12902400*p**5*r**7*s + 87040000*p**2*q**2*r**7*s + 15360000*p**3*r**8*s + 12800000*q**2*r**8*s - 38070*p**9*q**5*s**2 - 566700*p**6*q**7*s**2 - 2574375*p**3*q**9*s**2 - 1822500*q**11*s**2 + 292815*p**10*q**3*r*s**2 + 5170280*p**7*q**5*r*s**2 + 27918125*p**4*q**7*r*s**2 + 21997500*p*q**9*r*s**2 - 573480*p**11*q*r**2*s**2 - 14566350*p**8*q**3*r**2*s**2 - 104851575*p**5*q**5*r**2*s**2 - 96448750*p**2*q**7*r**2*s**2 + 11001240*p**9*q*r**3*s**2 + 147798600*p**6*q**3*r**3*s**2 + 158632750*p**3*q**5*r**3*s**2 - 78222500*q**7*r**3*s**2 - 62819200*p**7*q*r**4*s**2 - 136160000*p**4*q**3*r**4*s**2 + 317555000*p*q**5*r**4*s**2 + 160224000*p**5*q*r**5*s**2 - 267600000*p**2*q**3*r**5*s**2 - 153600000*p**3*q*r**6*s**2 - 120000000*q**3*r**6*s**2 - 32000000*p*q*r**7*s**2 - 127575*p**11*q**2*s**3 - 2148750*p**8*q**4*s**3 - 13652500*p**5*q**6*s**3 - 19531250*p**2*q**8*s**3 + 495720*p**12*r*s**3 + 11856375*p**9*q**2*r*s**3 + 107807500*p**6*q**4*r*s**3 + 222334375*p**3*q**6*r*s**3 + 105062500*q**8*r*s**3 - 11566800*p**10*r**2*s**3 - 216787500*p**7*q**2*r**2*s**3 - 633437500*p**4*q**4*r**2*s**3 - 504484375*p*q**6*r**2*s**3 + 90918000*p**8*r**3*s**3 + 567080000*p**5*q**2*r**3*s**3 + 692937500*p**2*q**4*r**3*s**3 - 326640000*p**6*r**4*s**3 - 339000000*p**3*q**2*r**4*s**3 + 369250000*q**4*r**4*s**3 + 560000000*p**4*r**5*s**3 + 508000000*p*q**2*r**5*s**3 - 480000000*p**2*r**6*s**3 + 320000000*r**7*s**3 - 455625*p**10*q*s**4 - 27562500*p**7*q**3*s**4 - 120593750*p**4*q**5*s**4 - 60312500*p*q**7*s**4 + 110615625*p**8*q*r*s**4 + 662984375*p**5*q**3*r*s**4 + 528515625*p**2*q**5*r*s**4 - 541687500*p**6*q*r**2*s**4 - 1262343750*p**3*q**3*r**2*s**4 - 466406250*q**5*r**2*s**4 + 633000000*p**4*q*r**3*s**4 - 1264375000*p*q**3*r**3*s**4 + 1085000000*p**2*q*r**4*s**4 - 2700000000*q*r**5*s**4 - 68343750*p**9*s**5 - 478828125*p**6*q**2*s**5 - 355468750*p**3*q**4*s**5 - 11718750*q**6*s**5 + 718031250*p**7*r*s**5 + 1658593750*p**4*q**2*r*s**5 + 2212890625*p*q**4*r*s**5 - 2855625000*p**5*r**2*s**5 - 4273437500*p**2*q**2*r**2*s**5 + 4537500000*p**3*r**3*s**5 + 8031250000*q**2*r**3*s**5 - 1750000000*p*r**4*s**5 + 1353515625*p**5*q*s**6 + 1562500000*p**2*q**3*s**6 - 3964843750*p**3*q*r*s**6 - 7226562500*q**3*r*s**6 + 1953125000*p*q*r**2*s**6 - 1757812500*p**4*s**7 - 3173828125*p*q**2*s**7 + 6445312500*p**2*r*s**7 - 3906250000*r**2*s**7 + 6103515625*q*s**8 + + c[4] = 40*p**6*q**9 + 110*p**3*q**11 - 1080*q**13 - 560*p**7*q**7*r - 1780*p**4*q**9*r + 17370*p*q**11*r + 2850*p**8*q**5*r**2 + 10520*p**5*q**7*r**2 - 115910*p**2*q**9*r**2 - 6090*p**9*q**3*r**3 - 25330*p**6*q**5*r**3 + 448740*p**3*q**7*r**3 + 128230*q**9*r**3 + 4320*p**10*q*r**4 + 16960*p**7*q**3*r**4 - 1143600*p**4*q**5*r**4 - 1410310*p*q**7*r**4 + 3840*p**8*q*r**5 + 1744480*p**5*q**3*r**5 + 5619520*p**2*q**5*r**5 - 1198080*p**6*q*r**6 - 10579200*p**3*q**3*r**6 - 2940800*q**5*r**6 + 8294400*p**4*q*r**7 + 13568000*p*q**3*r**7 - 15360000*p**2*q*r**8 + 840*p**8*q**6*s + 7580*p**5*q**8*s + 24420*p**2*q**10*s - 8100*p**9*q**4*r*s - 94100*p**6*q**6*r*s - 473000*p**3*q**8*r*s - 473400*q**10*r*s + 22680*p**10*q**2*r**2*s + 374370*p**7*q**4*r**2*s + 2888020*p**4*q**6*r**2*s + 5561050*p*q**8*r**2*s - 12960*p**11*r**3*s - 485820*p**8*q**2*r**3*s - 6723440*p**5*q**4*r**3*s - 23561400*p**2*q**6*r**3*s + 190080*p**9*r**4*s + 5894880*p**6*q**2*r**4*s + 50882000*p**3*q**4*r**4*s + 22411500*q**6*r**4*s - 258560*p**7*r**5*s - 46248000*p**4*q**2*r**5*s - 103800000*p*q**4*r**5*s - 3737600*p**5*r**6*s + 119680000*p**2*q**2*r**6*s + 10240000*p**3*r**7*s + 19200000*q**2*r**7*s + 7290*p**10*q**3*s**2 + 117360*p**7*q**5*s**2 + 691250*p**4*q**7*s**2 - 198750*p*q**9*s**2 - 36450*p**11*q*r*s**2 - 854550*p**8*q**3*r*s**2 - 7340700*p**5*q**5*r*s**2 - 2028750*p**2*q**7*r*s**2 + 995490*p**9*q*r**2*s**2 + 18896600*p**6*q**3*r**2*s**2 + 5026500*p**3*q**5*r**2*s**2 - 52272500*q**7*r**2*s**2 - 16636800*p**7*q*r**3*s**2 - 43200000*p**4*q**3*r**3*s**2 + 223426250*p*q**5*r**3*s**2 + 112068000*p**5*q*r**4*s**2 - 177000000*p**2*q**3*r**4*s**2 - 244000000*p**3*q*r**5*s**2 - 156000000*q**3*r**5*s**2 + 43740*p**12*s**3 + 1032750*p**9*q**2*s**3 + 8602500*p**6*q**4*s**3 + 15606250*p**3*q**6*s**3 + 39625000*q**8*s**3 - 1603800*p**10*r*s**3 - 26932500*p**7*q**2*r*s**3 - 19562500*p**4*q**4*r*s**3 - 152000000*p*q**6*r*s**3 + 25555500*p**8*r**2*s**3 + 16230000*p**5*q**2*r**2*s**3 + 42187500*p**2*q**4*r**2*s**3 - 165660000*p**6*r**3*s**3 + 373500000*p**3*q**2*r**3*s**3 + 332937500*q**4*r**3*s**3 + 465000000*p**4*r**4*s**3 + 586000000*p*q**2*r**4*s**3 - 592000000*p**2*r**5*s**3 + 480000000*r**6*s**3 - 1518750*p**8*q*s**4 - 62531250*p**5*q**3*s**4 + 7656250*p**2*q**5*s**4 + 184781250*p**6*q*r*s**4 - 15781250*p**3*q**3*r*s**4 - 135156250*q**5*r*s**4 - 1148250000*p**4*q*r**2*s**4 - 2121406250*p*q**3*r**2*s**4 + 1990000000*p**2*q*r**3*s**4 - 3150000000*q*r**4*s**4 - 2531250*p**7*s**5 + 660937500*p**4*q**2*s**5 + 1339843750*p*q**4*s**5 - 33750000*p**5*r*s**5 - 679687500*p**2*q**2*r*s**5 + 6250000*p**3*r**2*s**5 + 6195312500*q**2*r**2*s**5 + 1125000000*p*r**3*s**5 - 996093750*p**3*q*s**6 - 3125000000*q**3*s**6 - 3222656250*p*q*r*s**6 + 1171875000*p**2*s**7 + 976562500*r*s**7 + + c[3] = 80*p**4*q**9 + 540*p*q**11 - 600*p**5*q**7*r - 4770*p**2*q**9*r + 1230*p**6*q**5*r**2 + 20900*p**3*q**7*r**2 + 47250*q**9*r**2 - 710*p**7*q**3*r**3 - 84950*p**4*q**5*r**3 - 526310*p*q**7*r**3 + 720*p**8*q*r**4 + 216280*p**5*q**3*r**4 + 2068020*p**2*q**5*r**4 - 198080*p**6*q*r**5 - 3703200*p**3*q**3*r**5 - 1423600*q**5*r**5 + 2860800*p**4*q*r**6 + 7056000*p*q**3*r**6 - 8320000*p**2*q*r**7 - 2720*p**6*q**6*s - 46350*p**3*q**8*s - 178200*q**10*s + 25740*p**7*q**4*r*s + 489490*p**4*q**6*r*s + 2152350*p*q**8*r*s - 61560*p**8*q**2*r**2*s - 1568150*p**5*q**4*r**2*s - 9060500*p**2*q**6*r**2*s + 24840*p**9*r**3*s + 1692380*p**6*q**2*r**3*s + 18098250*p**3*q**4*r**3*s + 9387750*q**6*r**3*s - 382560*p**7*r**4*s - 16818000*p**4*q**2*r**4*s - 49325000*p*q**4*r**4*s + 1212800*p**5*r**5*s + 64840000*p**2*q**2*r**5*s - 320000*p**3*r**6*s + 10400000*q**2*r**6*s - 36450*p**8*q**3*s**2 - 588350*p**5*q**5*s**2 - 2156250*p**2*q**7*s**2 + 123930*p**9*q*r*s**2 + 2879700*p**6*q**3*r*s**2 + 12548000*p**3*q**5*r*s**2 - 14445000*q**7*r*s**2 - 3233250*p**7*q*r**2*s**2 - 28485000*p**4*q**3*r**2*s**2 + 72231250*p*q**5*r**2*s**2 + 32093000*p**5*q*r**3*s**2 - 61275000*p**2*q**3*r**3*s**2 - 107500000*p**3*q*r**4*s**2 - 78500000*q**3*r**4*s**2 + 22000000*p*q*r**5*s**2 - 72900*p**10*s**3 - 1215000*p**7*q**2*s**3 - 2937500*p**4*q**4*s**3 + 9156250*p*q**6*s**3 + 2612250*p**8*r*s**3 + 16560000*p**5*q**2*r*s**3 - 75468750*p**2*q**4*r*s**3 - 32737500*p**6*r**2*s**3 + 169062500*p**3*q**2*r**2*s**3 + 121718750*q**4*r**2*s**3 + 160250000*p**4*r**3*s**3 + 219750000*p*q**2*r**3*s**3 - 317000000*p**2*r**4*s**3 + 260000000*r**5*s**3 + 2531250*p**6*q*s**4 + 22500000*p**3*q**3*s**4 + 39843750*q**5*s**4 - 266343750*p**4*q*r*s**4 - 776406250*p*q**3*r*s**4 + 789062500*p**2*q*r**2*s**4 - 1368750000*q*r**3*s**4 + 67500000*p**5*s**5 + 441406250*p**2*q**2*s**5 - 311718750*p**3*r*s**5 + 1785156250*q**2*r*s**5 + 546875000*p*r**2*s**5 - 1269531250*p*q*s**6 + 488281250*s**7 + + c[2] = 120*p**5*q**7 + 810*p**2*q**9 - 1280*p**6*q**5*r - 9160*p**3*q**7*r + 3780*q**9*r + 4530*p**7*q**3*r**2 + 36640*p**4*q**5*r**2 - 45270*p*q**7*r**2 - 5400*p**8*q*r**3 - 60920*p**5*q**3*r**3 + 200050*p**2*q**5*r**3 + 31200*p**6*q*r**4 - 476000*p**3*q**3*r**4 - 378200*q**5*r**4 + 521600*p**4*q*r**5 + 1872000*p*q**3*r**5 - 2240000*p**2*q*r**6 + 1440*p**7*q**4*s + 15310*p**4*q**6*s + 59400*p*q**8*s - 9180*p**8*q**2*r*s - 115240*p**5*q**4*r*s - 589650*p**2*q**6*r*s + 16200*p**9*r**2*s + 316710*p**6*q**2*r**2*s + 2547750*p**3*q**4*r**2*s + 2178000*q**6*r**2*s - 259200*p**7*r**3*s - 4123000*p**4*q**2*r**3*s - 11700000*p*q**4*r**3*s + 937600*p**5*r**4*s + 16340000*p**2*q**2*r**4*s - 640000*p**3*r**5*s + 2800000*q**2*r**5*s - 2430*p**9*q*s**2 - 54450*p**6*q**3*s**2 - 285500*p**3*q**5*s**2 - 2767500*q**7*s**2 + 43200*p**7*q*r*s**2 - 916250*p**4*q**3*r*s**2 + 14482500*p*q**5*r*s**2 + 4806000*p**5*q*r**2*s**2 - 13212500*p**2*q**3*r**2*s**2 - 25400000*p**3*q*r**3*s**2 - 18750000*q**3*r**3*s**2 + 8000000*p*q*r**4*s**2 + 121500*p**8*s**3 + 2058750*p**5*q**2*s**3 - 6656250*p**2*q**4*s**3 - 6716250*p**6*r*s**3 + 24125000*p**3*q**2*r*s**3 + 23875000*q**4*r*s**3 + 43125000*p**4*r**2*s**3 + 45750000*p*q**2*r**2*s**3 - 87500000*p**2*r**3*s**3 + 70000000*r**4*s**3 - 44437500*p**4*q*s**4 - 107968750*p*q**3*s**4 + 159531250*p**2*q*r*s**4 - 284375000*q*r**2*s**4 + 7031250*p**3*s**5 + 265625000*q**2*s**5 + 31250000*p*r*s**5 + + c[1] = 160*p**3*q**7 + 1080*q**9 - 1080*p**4*q**5*r - 8730*p*q**7*r + 1510*p**5*q**3*r**2 + 20420*p**2*q**5*r**2 + 720*p**6*q*r**3 - 23200*p**3*q**3*r**3 - 79900*q**5*r**3 + 35200*p**4*q*r**4 + 404000*p*q**3*r**4 - 480000*p**2*q*r**5 + 960*p**5*q**4*s + 2850*p**2*q**6*s + 540*p**6*q**2*r*s + 63500*p**3*q**4*r*s + 319500*q**6*r*s - 7560*p**7*r**2*s - 253500*p**4*q**2*r**2*s - 1806250*p*q**4*r**2*s + 91200*p**5*r**3*s + 2600000*p**2*q**2*r**3*s - 80000*p**3*r**4*s + 600000*q**2*r**4*s - 4050*p**7*q*s**2 - 120000*p**4*q**3*s**2 - 273750*p*q**5*s**2 + 425250*p**5*q*r*s**2 + 2325000*p**2*q**3*r*s**2 - 5400000*p**3*q*r**2*s**2 - 2875000*q**3*r**2*s**2 + 1500000*p*q*r**3*s**2 - 303750*p**6*s**3 - 843750*p**3*q**2*s**3 - 812500*q**4*s**3 + 5062500*p**4*r*s**3 + 13312500*p*q**2*r*s**3 - 14500000*p**2*r**2*s**3 + 15000000*r**3*s**3 - 3750000*p**2*q*s**4 - 35937500*q*r*s**4 + 11718750*p*s**5 + + c[0] = 80*p**4*q**5 + 540*p*q**7 - 600*p**5*q**3*r - 4770*p**2*q**5*r + 1080*p**6*q*r**2 + 11200*p**3*q**3*r**2 - 12150*q**5*r**2 - 4800*p**4*q*r**3 + 64000*p*q**3*r**3 - 80000*p**2*q*r**4 + 1080*p**6*q**2*s + 13250*p**3*q**4*s + 54000*q**6*s - 3240*p**7*r*s - 56250*p**4*q**2*r*s - 337500*p*q**4*r*s + 43200*p**5*r**2*s + 560000*p**2*q**2*r**2*s - 80000*p**3*r**3*s + 100000*q**2*r**3*s + 6750*p**5*q*s**2 + 225000*p**2*q**3*s**2 - 900000*p**3*q*r*s**2 - 562500*q**3*r*s**2 + 500000*p*q*r**2*s**2 + 843750*p**4*s**3 + 1937500*p*q**2*s**3 - 3000000*p**2*r*s**3 + 2500000*r**2*s**3 - 5468750*q*s**4 + + return c + + @property + def F(self): + p, q, r, s = self.p, self.q, self.r, self.s + F = 4*p**6*q**6 + 59*p**3*q**8 + 216*q**10 - 36*p**7*q**4*r - 623*p**4*q**6*r - 2610*p*q**8*r + 81*p**8*q**2*r**2 + 2015*p**5*q**4*r**2 + 10825*p**2*q**6*r**2 - 1800*p**6*q**2*r**3 - 17500*p**3*q**4*r**3 + 625*q**6*r**3 + 10000*p**4*q**2*r**4 + 108*p**8*q**3*s + 1584*p**5*q**5*s + 5700*p**2*q**7*s - 486*p**9*q*r*s - 9720*p**6*q**3*r*s - 45050*p**3*q**5*r*s - 9000*q**7*r*s + 10800*p**7*q*r**2*s + 92500*p**4*q**3*r**2*s + 32500*p*q**5*r**2*s - 60000*p**5*q*r**3*s - 50000*p**2*q**3*r**3*s + 729*p**10*s**2 + 12150*p**7*q**2*s**2 + 60000*p**4*q**4*s**2 + 93750*p*q**6*s**2 - 18225*p**8*r*s**2 - 175500*p**5*q**2*r*s**2 - 478125*p**2*q**4*r*s**2 + 135000*p**6*r**2*s**2 + 850000*p**3*q**2*r**2*s**2 + 15625*q**4*r**2*s**2 - 250000*p**4*r**3*s**2 + 225000*p**3*q**3*s**3 + 175000*q**5*s**3 - 1012500*p**4*q*r*s**3 - 1187500*p*q**3*r*s**3 + 1250000*p**2*q*r**2*s**3 + 928125*p**5*s**4 + 1875000*p**2*q**2*s**4 - 2812500*p**3*r*s**4 - 390625*q**2*r*s**4 - 9765625*s**6 + return F + + def l0(self, theta): + F = self.F + a = self.a + l0 = Poly(a, x).eval(theta)/F + return l0 + + def T(self, theta, d): + F = self.F + T = [0]*5 + b = self.b + # Note that the order of sublists of the b's has been reversed compared to the paper + T[1] = -Poly(b[1], x).eval(theta)/(2*F) + T[2] = Poly(b[2], x).eval(theta)/(2*d*F) + T[3] = Poly(b[3], x).eval(theta)/(2*F) + T[4] = Poly(b[4], x).eval(theta)/(2*d*F) + return T + + def order(self, theta, d): + F = self.F + o = self.o + order = Poly(o, x).eval(theta)/(d*F) + return N(order) + + def uv(self, theta, d): + c = self.c + u = self.q*Rational(-25, 2) + v = Poly(c, x).eval(theta)/(2*d*self.F) + return N(u), N(v) + + @property + def zeta(self): + return [self.zeta1, self.zeta2, self.zeta3, self.zeta4] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyroots.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyroots.py new file mode 100644 index 0000000000000000000000000000000000000000..4def1312eb5b94a13e511d2d4f9b15f1d51fd63f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyroots.py @@ -0,0 +1,1227 @@ +"""Algorithms for computing symbolic roots of polynomials. """ + + +import math +from functools import reduce + +from sympy.core import S, I, pi +from sympy.core.exprtools import factor_terms +from sympy.core.function import _mexpand +from sympy.core.logic import fuzzy_not +from sympy.core.mul import expand_2arg, Mul +from sympy.core.intfunc import igcd +from sympy.core.numbers import Rational, comp +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy, Symbol, symbols +from sympy.core.sympify import sympify +from sympy.functions import exp, im, cos, acos, Piecewise +from sympy.functions.elementary.miscellaneous import root, sqrt +from sympy.ntheory import divisors, isprime, nextprime +from sympy.polys.domains import EX +from sympy.polys.polyerrors import (PolynomialError, GeneratorsNeeded, + DomainError, UnsolvableFactorError) +from sympy.polys.polyquinticconst import PolyQuintic +from sympy.polys.polytools import Poly, cancel, factor, gcd_list, discriminant +from sympy.polys.rationaltools import together +from sympy.polys.specialpolys import cyclotomic_poly +from sympy.utilities import public +from sympy.utilities.misc import filldedent + + + +z = Symbol('z') # importing from abc cause O to be lost as clashing symbol + + +def roots_linear(f): + """Returns a list of roots of a linear polynomial.""" + r = -f.nth(0)/f.nth(1) + dom = f.get_domain() + + if not dom.is_Numerical: + if dom.is_Composite: + r = factor(r) + else: + from sympy.simplify.simplify import simplify + r = simplify(r) + + return [r] + + +def roots_quadratic(f): + """Returns a list of roots of a quadratic polynomial. If the domain is ZZ + then the roots will be sorted with negatives coming before positives. + The ordering will be the same for any numerical coefficients as long as + the assumptions tested are correct, otherwise the ordering will not be + sorted (but will be canonical). + """ + + a, b, c = f.all_coeffs() + dom = f.get_domain() + + def _sqrt(d): + # remove squares from square root since both will be represented + # in the results; a similar thing is happening in roots() but + # must be duplicated here because not all quadratics are binomials + co = [] + other = [] + for di in Mul.make_args(d): + if di.is_Pow and di.exp.is_Integer and di.exp % 2 == 0: + co.append(Pow(di.base, di.exp//2)) + else: + other.append(di) + if co: + d = Mul(*other) + co = Mul(*co) + return co*sqrt(d) + return sqrt(d) + + def _simplify(expr): + if dom.is_Composite: + return factor(expr) + else: + from sympy.simplify.simplify import simplify + return simplify(expr) + + if c is S.Zero: + r0, r1 = S.Zero, -b/a + + if not dom.is_Numerical: + r1 = _simplify(r1) + elif r1.is_negative: + r0, r1 = r1, r0 + elif b is S.Zero: + r = -c/a + if not dom.is_Numerical: + r = _simplify(r) + + R = _sqrt(r) + r0 = -R + r1 = R + else: + d = b**2 - 4*a*c + A = 2*a + B = -b/A + + if not dom.is_Numerical: + d = _simplify(d) + B = _simplify(B) + + D = factor_terms(_sqrt(d)/A) + r0 = B - D + r1 = B + D + if a.is_negative: + r0, r1 = r1, r0 + elif not dom.is_Numerical: + r0, r1 = [expand_2arg(i) for i in (r0, r1)] + + return [r0, r1] + + +def roots_cubic(f, trig=False): + """Returns a list of roots of a cubic polynomial. + + References + ========== + [1] https://en.wikipedia.org/wiki/Cubic_function, General formula for roots, + (accessed November 17, 2014). + """ + if trig: + a, b, c, d = f.all_coeffs() + p = (3*a*c - b**2)/(3*a**2) + q = (2*b**3 - 9*a*b*c + 27*a**2*d)/(27*a**3) + D = 18*a*b*c*d - 4*b**3*d + b**2*c**2 - 4*a*c**3 - 27*a**2*d**2 + if (D > 0) == True: + rv = [] + for k in range(3): + rv.append(2*sqrt(-p/3)*cos(acos(q/p*sqrt(-3/p)*Rational(3, 2))/3 - k*pi*Rational(2, 3))) + return [i - b/3/a for i in rv] + + # a*x**3 + b*x**2 + c*x + d -> x**3 + a*x**2 + b*x + c + _, a, b, c = f.monic().all_coeffs() + + if c is S.Zero: + x1, x2 = roots([1, a, b], multiple=True) + return [x1, S.Zero, x2] + + # x**3 + a*x**2 + b*x + c -> u**3 + p*u + q + p = b - a**2/3 + q = c - a*b/3 + 2*a**3/27 + + pon3 = p/3 + aon3 = a/3 + + u1 = None + if p is S.Zero: + if q is S.Zero: + return [-aon3]*3 + u1 = -root(q, 3) if q.is_positive else root(-q, 3) + elif q is S.Zero: + y1, y2 = roots([1, 0, p], multiple=True) + return [tmp - aon3 for tmp in [y1, S.Zero, y2]] + elif q.is_real and q.is_negative: + u1 = -root(-q/2 + sqrt(q**2/4 + pon3**3), 3) + + coeff = I*sqrt(3)/2 + if u1 is None: + u1 = S.One + u2 = Rational(-1, 2) + coeff + u3 = Rational(-1, 2) - coeff + b, c, d = a, b, c # a, b, c, d = S.One, a, b, c + D0 = b**2 - 3*c # b**2 - 3*a*c + D1 = 2*b**3 - 9*b*c + 27*d # 2*b**3 - 9*a*b*c + 27*a**2*d + C = root((D1 + sqrt(D1**2 - 4*D0**3))/2, 3) + return [-(b + uk*C + D0/C/uk)/3 for uk in [u1, u2, u3]] # -(b + uk*C + D0/C/uk)/3/a + + u2 = u1*(Rational(-1, 2) + coeff) + u3 = u1*(Rational(-1, 2) - coeff) + + if p is S.Zero: + return [u1 - aon3, u2 - aon3, u3 - aon3] + + soln = [ + -u1 + pon3/u1 - aon3, + -u2 + pon3/u2 - aon3, + -u3 + pon3/u3 - aon3 + ] + + return soln + +def _roots_quartic_euler(p, q, r, a): + """ + Descartes-Euler solution of the quartic equation + + Parameters + ========== + + p, q, r: coefficients of ``x**4 + p*x**2 + q*x + r`` + a: shift of the roots + + Notes + ===== + + This is a helper function for ``roots_quartic``. + + Look for solutions of the form :: + + ``x1 = sqrt(R) - sqrt(A + B*sqrt(R))`` + ``x2 = -sqrt(R) - sqrt(A - B*sqrt(R))`` + ``x3 = -sqrt(R) + sqrt(A - B*sqrt(R))`` + ``x4 = sqrt(R) + sqrt(A + B*sqrt(R))`` + + To satisfy the quartic equation one must have + ``p = -2*(R + A); q = -4*B*R; r = (R - A)**2 - B**2*R`` + so that ``R`` must satisfy the Descartes-Euler resolvent equation + ``64*R**3 + 32*p*R**2 + (4*p**2 - 16*r)*R - q**2 = 0`` + + If the resolvent does not have a rational solution, return None; + in that case it is likely that the Ferrari method gives a simpler + solution. + + Examples + ======== + + >>> from sympy import S + >>> from sympy.polys.polyroots import _roots_quartic_euler + >>> p, q, r = -S(64)/5, -S(512)/125, -S(1024)/3125 + >>> _roots_quartic_euler(p, q, r, S(0))[0] + -sqrt(32*sqrt(5)/125 + 16/5) + 4*sqrt(5)/5 + """ + # solve the resolvent equation + x = Dummy('x') + eq = 64*x**3 + 32*p*x**2 + (4*p**2 - 16*r)*x - q**2 + xsols = list(roots(Poly(eq, x), cubics=False).keys()) + xsols = [sol for sol in xsols if sol.is_rational and sol.is_nonzero] + if not xsols: + return None + R = max(xsols) + c1 = sqrt(R) + B = -q*c1/(4*R) + A = -R - p/2 + c2 = sqrt(A + B) + c3 = sqrt(A - B) + return [c1 - c2 - a, -c1 - c3 - a, -c1 + c3 - a, c1 + c2 - a] + + +def roots_quartic(f): + r""" + Returns a list of roots of a quartic polynomial. + + There are many references for solving quartic expressions available [1-5]. + This reviewer has found that many of them require one to select from among + 2 or more possible sets of solutions and that some solutions work when one + is searching for real roots but do not work when searching for complex roots + (though this is not always stated clearly). The following routine has been + tested and found to be correct for 0, 2 or 4 complex roots. + + The quasisymmetric case solution [6] looks for quartics that have the form + `x**4 + A*x**3 + B*x**2 + C*x + D = 0` where `(C/A)**2 = D`. + + Although no general solution that is always applicable for all + coefficients is known to this reviewer, certain conditions are tested + to determine the simplest 4 expressions that can be returned: + + 1) `f = c + a*(a**2/8 - b/2) == 0` + 2) `g = d - a*(a*(3*a**2/256 - b/16) + c/4) = 0` + 3) if `f != 0` and `g != 0` and `p = -d + a*c/4 - b**2/12` then + a) `p == 0` + b) `p != 0` + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.polys.polyroots import roots_quartic + + >>> r = roots_quartic(Poly('x**4-6*x**3+17*x**2-26*x+20')) + + >>> # 4 complex roots: 1+-I*sqrt(3), 2+-I + >>> sorted(str(tmp.evalf(n=2)) for tmp in r) + ['1.0 + 1.7*I', '1.0 - 1.7*I', '2.0 + 1.0*I', '2.0 - 1.0*I'] + + References + ========== + + 1. http://mathforum.org/dr.math/faq/faq.cubic.equations.html + 2. https://en.wikipedia.org/wiki/Quartic_function#Summary_of_Ferrari.27s_method + 3. https://planetmath.org/encyclopedia/GaloisTheoreticDerivationOfTheQuarticFormula.html + 4. https://people.bath.ac.uk/masjhd/JHD-CA.pdf + 5. http://www.albmath.org/files/Math_5713.pdf + 6. https://web.archive.org/web/20171002081448/http://www.statemaster.com/encyclopedia/Quartic-equation + 7. https://eqworld.ipmnet.ru/en/solutions/ae/ae0108.pdf + """ + _, a, b, c, d = f.monic().all_coeffs() + + if not d: + return [S.Zero] + roots([1, a, b, c], multiple=True) + elif (c/a)**2 == d: + x, m = f.gen, c/a + + g = Poly(x**2 + a*x + b - 2*m, x) + + z1, z2 = roots_quadratic(g) + + h1 = Poly(x**2 - z1*x + m, x) + h2 = Poly(x**2 - z2*x + m, x) + + r1 = roots_quadratic(h1) + r2 = roots_quadratic(h2) + + return r1 + r2 + else: + a2 = a**2 + e = b - 3*a2/8 + f = _mexpand(c + a*(a2/8 - b/2)) + aon4 = a/4 + g = _mexpand(d - aon4*(a*(3*a2/64 - b/4) + c)) + + if f.is_zero: + y1, y2 = [sqrt(tmp) for tmp in + roots([1, e, g], multiple=True)] + return [tmp - aon4 for tmp in [-y1, -y2, y1, y2]] + if g.is_zero: + y = [S.Zero] + roots([1, 0, e, f], multiple=True) + return [tmp - aon4 for tmp in y] + else: + # Descartes-Euler method, see [7] + sols = _roots_quartic_euler(e, f, g, aon4) + if sols: + return sols + # Ferrari method, see [1, 2] + p = -e**2/12 - g + q = -e**3/108 + e*g/3 - f**2/8 + TH = Rational(1, 3) + + def _ans(y): + w = sqrt(e + 2*y) + arg1 = 3*e + 2*y + arg2 = 2*f/w + ans = [] + for s in [-1, 1]: + root = sqrt(-(arg1 + s*arg2)) + for t in [-1, 1]: + ans.append((s*w - t*root)/2 - aon4) + return ans + + # whether a Piecewise is returned or not + # depends on knowing p, so try to put + # in a simple form + p = _mexpand(p) + + + # p == 0 case + y1 = e*Rational(-5, 6) - q**TH + if p.is_zero: + return _ans(y1) + + # if p != 0 then u below is not 0 + root = sqrt(q**2/4 + p**3/27) + r = -q/2 + root # or -q/2 - root + u = r**TH # primary root of solve(x**3 - r, x) + y2 = e*Rational(-5, 6) + u - p/u/3 + if fuzzy_not(p.is_zero): + return _ans(y2) + + # sort it out once they know the values of the coefficients + return [Piecewise((a1, Eq(p, 0)), (a2, True)) + for a1, a2 in zip(_ans(y1), _ans(y2))] + + +def roots_binomial(f): + """Returns a list of roots of a binomial polynomial. If the domain is ZZ + then the roots will be sorted with negatives coming before positives. + The ordering will be the same for any numerical coefficients as long as + the assumptions tested are correct, otherwise the ordering will not be + sorted (but will be canonical). + """ + n = f.degree() + + a, b = f.nth(n), f.nth(0) + base = -cancel(b/a) + alpha = root(base, n) + + if alpha.is_number: + alpha = alpha.expand(complex=True) + + # define some parameters that will allow us to order the roots. + # If the domain is ZZ this is guaranteed to return roots sorted + # with reals before non-real roots and non-real sorted according + # to real part and imaginary part, e.g. -1, 1, -1 + I, 2 - I + neg = base.is_negative + even = n % 2 == 0 + if neg: + if even == True and (base + 1).is_positive: + big = True + else: + big = False + + # get the indices in the right order so the computed + # roots will be sorted when the domain is ZZ + ks = [] + imax = n//2 + if even: + ks.append(imax) + imax -= 1 + if not neg: + ks.append(0) + for i in range(imax, 0, -1): + if neg: + ks.extend([i, -i]) + else: + ks.extend([-i, i]) + if neg: + ks.append(0) + if big: + for i in range(0, len(ks), 2): + pair = ks[i: i + 2] + pair = list(reversed(pair)) + + # compute the roots + roots, d = [], 2*I*pi/n + for k in ks: + zeta = exp(k*d).expand(complex=True) + roots.append((alpha*zeta).expand(power_base=False)) + + return roots + + +def _inv_totient_estimate(m): + """ + Find ``(L, U)`` such that ``L <= phi^-1(m) <= U``. + + Examples + ======== + + >>> from sympy.polys.polyroots import _inv_totient_estimate + + >>> _inv_totient_estimate(192) + (192, 840) + >>> _inv_totient_estimate(400) + (400, 1750) + + """ + primes = [ d + 1 for d in divisors(m) if isprime(d + 1) ] + + a, b = 1, 1 + + for p in primes: + a *= p + b *= p - 1 + + L = m + U = int(math.ceil(m*(float(a)/b))) + + P = p = 2 + primes = [] + + while P <= U: + p = nextprime(p) + primes.append(p) + P *= p + + P //= p + b = 1 + + for p in primes[:-1]: + b *= p - 1 + + U = int(math.ceil(m*(float(P)/b))) + + return L, U + + +def roots_cyclotomic(f, factor=False): + """Compute roots of cyclotomic polynomials. """ + L, U = _inv_totient_estimate(f.degree()) + + for n in range(L, U + 1): + g = cyclotomic_poly(n, f.gen, polys=True) + + if f.expr == g.expr: + break + else: # pragma: no cover + raise RuntimeError("failed to find index of a cyclotomic polynomial") + + roots = [] + + if not factor: + # get the indices in the right order so the computed + # roots will be sorted + h = n//2 + ks = [i for i in range(1, n + 1) if igcd(i, n) == 1] + ks.sort(key=lambda x: (x, -1) if x <= h else (abs(x - n), 1)) + d = 2*I*pi/n + for k in reversed(ks): + roots.append(exp(k*d).expand(complex=True)) + else: + g = Poly(f, extension=root(-1, n)) + + for h, _ in ordered(g.factor_list()[1]): + roots.append(-h.TC()) + + return roots + + +def roots_quintic(f): + """ + Calculate exact roots of a solvable irreducible quintic with rational coefficients. + Return an empty list if the quintic is reducible or not solvable. + """ + result = [] + + coeff_5, coeff_4, p_, q_, r_, s_ = f.all_coeffs() + + if not all(coeff.is_Rational for coeff in (coeff_5, coeff_4, p_, q_, r_, s_)): + return result + + if coeff_5 != 1: + f = Poly(f / coeff_5) + _, coeff_4, p_, q_, r_, s_ = f.all_coeffs() + + # Cancel coeff_4 to form x^5 + px^3 + qx^2 + rx + s + if coeff_4: + p = p_ - 2*coeff_4*coeff_4/5 + q = q_ - 3*coeff_4*p_/5 + 4*coeff_4**3/25 + r = r_ - 2*coeff_4*q_/5 + 3*coeff_4**2*p_/25 - 3*coeff_4**4/125 + s = s_ - coeff_4*r_/5 + coeff_4**2*q_/25 - coeff_4**3*p_/125 + 4*coeff_4**5/3125 + x = f.gen + f = Poly(x**5 + p*x**3 + q*x**2 + r*x + s) + else: + p, q, r, s = p_, q_, r_, s_ + + quintic = PolyQuintic(f) + + # Eqn standardized. Algo for solving starts here + if not f.is_irreducible: + return result + f20 = quintic.f20 + # Check if f20 has linear factors over domain Z + if f20.is_irreducible: + return result + # Now, we know that f is solvable + for _factor in f20.factor_list()[1]: + if _factor[0].is_linear: + theta = _factor[0].root(0) + break + d = discriminant(f) + delta = sqrt(d) + # zeta = a fifth root of unity + zeta1, zeta2, zeta3, zeta4 = quintic.zeta + T = quintic.T(theta, d) + tol = S(1e-10) + alpha = T[1] + T[2]*delta + alpha_bar = T[1] - T[2]*delta + beta = T[3] + T[4]*delta + beta_bar = T[3] - T[4]*delta + + disc = alpha**2 - 4*beta + disc_bar = alpha_bar**2 - 4*beta_bar + + l0 = quintic.l0(theta) + Stwo = S(2) + l1 = _quintic_simplify((-alpha + sqrt(disc)) / Stwo) + l4 = _quintic_simplify((-alpha - sqrt(disc)) / Stwo) + + l2 = _quintic_simplify((-alpha_bar + sqrt(disc_bar)) / Stwo) + l3 = _quintic_simplify((-alpha_bar - sqrt(disc_bar)) / Stwo) + + order = quintic.order(theta, d) + test = (order*delta.n()) - ( (l1.n() - l4.n())*(l2.n() - l3.n()) ) + # Comparing floats + if not comp(test, 0, tol): + l2, l3 = l3, l2 + + # Now we have correct order of l's + R1 = l0 + l1*zeta1 + l2*zeta2 + l3*zeta3 + l4*zeta4 + R2 = l0 + l3*zeta1 + l1*zeta2 + l4*zeta3 + l2*zeta4 + R3 = l0 + l2*zeta1 + l4*zeta2 + l1*zeta3 + l3*zeta4 + R4 = l0 + l4*zeta1 + l3*zeta2 + l2*zeta3 + l1*zeta4 + + Res = [None, [None]*5, [None]*5, [None]*5, [None]*5] + Res_n = [None, [None]*5, [None]*5, [None]*5, [None]*5] + + # Simplifying improves performance a lot for exact expressions + R1 = _quintic_simplify(R1) + R2 = _quintic_simplify(R2) + R3 = _quintic_simplify(R3) + R4 = _quintic_simplify(R4) + + # hard-coded results for [factor(i) for i in _vsolve(x**5 - a - I*b, x)] + x0 = z**(S(1)/5) + x1 = sqrt(2) + x2 = sqrt(5) + x3 = sqrt(5 - x2) + x4 = I*x2 + x5 = x4 + I + x6 = I*x0/4 + x7 = x1*sqrt(x2 + 5) + sol = [x0, -x6*(x1*x3 - x5), x6*(x1*x3 + x5), -x6*(x4 + x7 - I), x6*(-x4 + x7 + I)] + + R1 = R1.as_real_imag() + R2 = R2.as_real_imag() + R3 = R3.as_real_imag() + R4 = R4.as_real_imag() + + for i, s in enumerate(sol): + Res[1][i] = _quintic_simplify(s.xreplace({z: R1[0] + I*R1[1]})) + Res[2][i] = _quintic_simplify(s.xreplace({z: R2[0] + I*R2[1]})) + Res[3][i] = _quintic_simplify(s.xreplace({z: R3[0] + I*R3[1]})) + Res[4][i] = _quintic_simplify(s.xreplace({z: R4[0] + I*R4[1]})) + + for i in range(1, 5): + for j in range(5): + Res_n[i][j] = Res[i][j].n() + Res[i][j] = _quintic_simplify(Res[i][j]) + r1 = Res[1][0] + r1_n = Res_n[1][0] + + for i in range(5): + if comp(im(r1_n*Res_n[4][i]), 0, tol): + r4 = Res[4][i] + break + + # Now we have various Res values. Each will be a list of five + # values. We have to pick one r value from those five for each Res + u, v = quintic.uv(theta, d) + testplus = (u + v*delta*sqrt(5)).n() + testminus = (u - v*delta*sqrt(5)).n() + + # Evaluated numbers suffixed with _n + # We will use evaluated numbers for calculation. Much faster. + r4_n = r4.n() + r2 = r3 = None + + for i in range(5): + r2temp_n = Res_n[2][i] + for j in range(5): + # Again storing away the exact number and using + # evaluated numbers in computations + r3temp_n = Res_n[3][j] + if (comp((r1_n*r2temp_n**2 + r4_n*r3temp_n**2 - testplus).n(), 0, tol) and + comp((r3temp_n*r1_n**2 + r2temp_n*r4_n**2 - testminus).n(), 0, tol)): + r2 = Res[2][i] + r3 = Res[3][j] + break + if r2 is not None: + break + else: + return [] # fall back to normal solve + + # Now, we have r's so we can get roots + x1 = (r1 + r2 + r3 + r4)/5 + x2 = (r1*zeta4 + r2*zeta3 + r3*zeta2 + r4*zeta1)/5 + x3 = (r1*zeta3 + r2*zeta1 + r3*zeta4 + r4*zeta2)/5 + x4 = (r1*zeta2 + r2*zeta4 + r3*zeta1 + r4*zeta3)/5 + x5 = (r1*zeta1 + r2*zeta2 + r3*zeta3 + r4*zeta4)/5 + result = [x1, x2, x3, x4, x5] + + # Now check if solutions are distinct + + saw = set() + for r in result: + r = r.n(2) + if r in saw: + # Roots were identical. Abort, return [] + # and fall back to usual solve + return [] + saw.add(r) + + # Restore to original equation where coeff_4 is nonzero + if coeff_4: + result = [x - coeff_4 / 5 for x in result] + return result + + +def _quintic_simplify(expr): + from sympy.simplify.simplify import powsimp + expr = powsimp(expr) + expr = cancel(expr) + return together(expr) + + +def _integer_basis(poly): + """Compute coefficient basis for a polynomial over integers. + + Returns the integer ``div`` such that substituting ``x = div*y`` + ``p(x) = m*q(y)`` where the coefficients of ``q`` are smaller + than those of ``p``. + + For example ``x**5 + 512*x + 1024 = 0`` + with ``div = 4`` becomes ``y**5 + 2*y + 1 = 0`` + + Returns the integer ``div`` or ``None`` if there is no possible scaling. + + Examples + ======== + + >>> from sympy.polys import Poly + >>> from sympy.abc import x + >>> from sympy.polys.polyroots import _integer_basis + >>> p = Poly(x**5 + 512*x + 1024, x, domain='ZZ') + >>> _integer_basis(p) + 4 + """ + monoms, coeffs = list(zip(*poly.terms())) + + monoms, = list(zip(*monoms)) + coeffs = list(map(abs, coeffs)) + + if coeffs[0] < coeffs[-1]: + coeffs = list(reversed(coeffs)) + n = monoms[0] + monoms = [n - i for i in reversed(monoms)] + else: + return None + + monoms = monoms[:-1] + coeffs = coeffs[:-1] + + # Special case for two-term polynominals + if len(monoms) == 1: + r = Pow(coeffs[0], S.One/monoms[0]) + if r.is_Integer: + return int(r) + else: + return None + + divs = reversed(divisors(gcd_list(coeffs))[1:]) + + try: + div = next(divs) + except StopIteration: + return None + + while True: + for monom, coeff in zip(monoms, coeffs): + if coeff % div**monom != 0: + try: + div = next(divs) + except StopIteration: + return None + else: + break + else: + return div + + +def preprocess_roots(poly): + """Try to get rid of symbolic coefficients from ``poly``. """ + coeff = S.One + + poly_func = poly.func + try: + _, poly = poly.clear_denoms(convert=True) + except DomainError: + return coeff, poly + + poly = poly.primitive()[1] + poly = poly.retract() + + # TODO: This is fragile. Figure out how to make this independent of construct_domain(). + if poly.get_domain().is_Poly and all(c.is_term for c in poly.rep.coeffs()): + poly = poly.inject() + + strips = list(zip(*poly.monoms())) + gens = list(poly.gens[1:]) + + base, strips = strips[0], strips[1:] + + for gen, strip in zip(list(gens), strips): + reverse = False + + if strip[0] < strip[-1]: + strip = reversed(strip) + reverse = True + + ratio = None + + for a, b in zip(base, strip): + if not a and not b: + continue + elif not a or not b: + break + elif b % a != 0: + break + else: + _ratio = b // a + + if ratio is None: + ratio = _ratio + elif ratio != _ratio: + break + else: + if reverse: + ratio = -ratio + + poly = poly.eval(gen, 1) + coeff *= gen**(-ratio) + gens.remove(gen) + + if gens: + poly = poly.eject(*gens) + + if poly.is_univariate and poly.get_domain().is_ZZ: + basis = _integer_basis(poly) + + if basis is not None: + n = poly.degree() + + def func(k, coeff): + return coeff//basis**(n - k[0]) + + poly = poly.termwise(func) + coeff *= basis + + if not isinstance(poly, poly_func): + poly = poly_func(poly) + return coeff, poly + + +@public +def roots(f, *gens, + auto=True, + cubics=True, + trig=False, + quartics=True, + quintics=False, + multiple=False, + filter=None, + predicate=None, + strict=False, + **flags): + """ + Computes symbolic roots of a univariate polynomial. + + Given a univariate polynomial f with symbolic coefficients (or + a list of the polynomial's coefficients), returns a dictionary + with its roots and their multiplicities. + + Only roots expressible via radicals will be returned. To get + a complete set of roots use RootOf class or numerical methods + instead. By default cubic and quartic formulas are used in + the algorithm. To disable them because of unreadable output + set ``cubics=False`` or ``quartics=False`` respectively. If cubic + roots are real but are expressed in terms of complex numbers + (casus irreducibilis [1]) the ``trig`` flag can be set to True to + have the solutions returned in terms of cosine and inverse cosine + functions. + + To get roots from a specific domain set the ``filter`` flag with + one of the following specifiers: Z, Q, R, I, C. By default all + roots are returned (this is equivalent to setting ``filter='C'``). + + By default a dictionary is returned giving a compact result in + case of multiple roots. However to get a list containing all + those roots set the ``multiple`` flag to True; the list will + have identical roots appearing next to each other in the result. + (For a given Poly, the all_roots method will give the roots in + sorted numerical order.) + + If the ``strict`` flag is True, ``UnsolvableFactorError`` will be + raised if the roots found are known to be incomplete (because + some roots are not expressible in radicals). + + Examples + ======== + + >>> from sympy import Poly, roots, degree + >>> from sympy.abc import x, y + + >>> roots(x**2 - 1, x) + {-1: 1, 1: 1} + + >>> p = Poly(x**2-1, x) + >>> roots(p) + {-1: 1, 1: 1} + + >>> p = Poly(x**2-y, x, y) + + >>> roots(Poly(p, x)) + {-sqrt(y): 1, sqrt(y): 1} + + >>> roots(x**2 - y, x) + {-sqrt(y): 1, sqrt(y): 1} + + >>> roots([1, 0, -1]) + {-1: 1, 1: 1} + + ``roots`` will only return roots expressible in radicals. If + the given polynomial has some or all of its roots inexpressible in + radicals, the result of ``roots`` will be incomplete or empty + respectively. + + Example where result is incomplete: + + >>> roots((x-1)*(x**5-x+1), x) + {1: 1} + + In this case, the polynomial has an unsolvable quintic factor + whose roots cannot be expressed by radicals. The polynomial has a + rational root (due to the factor `(x-1)`), which is returned since + ``roots`` always finds all rational roots. + + Example where result is empty: + + >>> roots(x**7-3*x**2+1, x) + {} + + Here, the polynomial has no roots expressible in radicals, so + ``roots`` returns an empty dictionary. + + The result produced by ``roots`` is complete if and only if the + sum of the multiplicity of each root is equal to the degree of + the polynomial. If strict=True, UnsolvableFactorError will be + raised if the result is incomplete. + + The result can be be checked for completeness as follows: + + >>> f = x**3-2*x**2+1 + >>> sum(roots(f, x).values()) == degree(f, x) + True + >>> f = (x-1)*(x**5-x+1) + >>> sum(roots(f, x).values()) == degree(f, x) + False + + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Cubic_equation#Trigonometric_and_hyperbolic_solutions + + """ + from sympy.polys.polytools import to_rational_coeffs + flags = dict(flags) + + if isinstance(f, list): + if gens: + raise ValueError('redundant generators given') + + x = Dummy('x') + + poly, i = {}, len(f) - 1 + + for coeff in f: + poly[i], i = sympify(coeff), i - 1 + + f = Poly(poly, x, field=True) + else: + try: + F = Poly(f, *gens, **flags) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + raise PolynomialError("generator must be a Symbol") + f = F + except GeneratorsNeeded: + if multiple: + return [] + else: + return {} + else: + n = f.degree() + if f.length() == 2 and n > 2: + # check for foo**n in constant if dep is c*gen**m + con, dep = f.as_expr().as_independent(*f.gens) + fcon = -(-con).factor() + if fcon != con: + con = fcon + bases = [] + for i in Mul.make_args(con): + if i.is_Pow: + b, e = i.as_base_exp() + if e.is_Integer and b.is_Add: + bases.append((b, Dummy(positive=True))) + if bases: + rv = roots(Poly((dep + con).xreplace(dict(bases)), + *f.gens), *F.gens, + auto=auto, + cubics=cubics, + trig=trig, + quartics=quartics, + quintics=quintics, + multiple=multiple, + filter=filter, + predicate=predicate, + **flags) + return {factor_terms(k.xreplace( + {v: k for k, v in bases}) + ): v for k, v in rv.items()} + + if f.is_multivariate: + raise PolynomialError('multivariate polynomials are not supported') + + def _update_dict(result, zeros, currentroot, k): + if currentroot == S.Zero: + if S.Zero in zeros: + zeros[S.Zero] += k + else: + zeros[S.Zero] = k + if currentroot in result: + result[currentroot] += k + else: + result[currentroot] = k + + def _try_decompose(f): + """Find roots using functional decomposition. """ + factors, roots = f.decompose(), [] + + for currentroot in _try_heuristics(factors[0]): + roots.append(currentroot) + + for currentfactor in factors[1:]: + previous, roots = list(roots), [] + + for currentroot in previous: + g = currentfactor - Poly(currentroot, f.gen) + + for currentroot in _try_heuristics(g): + roots.append(currentroot) + + return roots + + def _try_heuristics(f): + """Find roots using formulas and some tricks. """ + if f.is_ground: + return [] + if f.is_monomial: + return [S.Zero]*f.degree() + + if f.length() == 2: + if f.degree() == 1: + return list(map(cancel, roots_linear(f))) + else: + return roots_binomial(f) + + result = [] + + for i in [-1, 1]: + if not f.eval(i): + f = f.quo(Poly(f.gen - i, f.gen)) + result.append(i) + break + + n = f.degree() + + if n == 1: + result += list(map(cancel, roots_linear(f))) + elif n == 2: + result += list(map(cancel, roots_quadratic(f))) + elif f.is_cyclotomic: + result += roots_cyclotomic(f) + elif n == 3 and cubics: + result += roots_cubic(f, trig=trig) + elif n == 4 and quartics: + result += roots_quartic(f) + elif n == 5 and quintics: + result += roots_quintic(f) + + return result + + # Convert the generators to symbols + dumgens = symbols('x:%d' % len(f.gens), cls=Dummy) + f = f.per(f.rep, dumgens) + + (k,), f = f.terms_gcd() + + if not k: + zeros = {} + else: + zeros = {S.Zero: k} + + coeff, f = preprocess_roots(f) + + if auto and f.get_domain().is_Ring: + f = f.to_field() + + # Use EX instead of ZZ_I or QQ_I + if f.get_domain().is_QQ_I: + f = f.per(f.rep.convert(EX)) + + rescale_x = None + translate_x = None + + result = {} + + if not f.is_ground: + dom = f.get_domain() + if not dom.is_Exact and dom.is_Numerical: + for r in f.nroots(): + _update_dict(result, zeros, r, 1) + elif f.degree() == 1: + _update_dict(result, zeros, roots_linear(f)[0], 1) + elif f.length() == 2: + roots_fun = roots_quadratic if f.degree() == 2 else roots_binomial + for r in roots_fun(f): + _update_dict(result, zeros, r, 1) + else: + _, factors = Poly(f.as_expr()).factor_list() + if len(factors) == 1 and f.degree() == 2: + for r in roots_quadratic(f): + _update_dict(result, zeros, r, 1) + else: + if len(factors) == 1 and factors[0][1] == 1: + if f.get_domain().is_EX: + res = to_rational_coeffs(f) + if res: + if res[0] is None: + translate_x, f = res[2:] + else: + rescale_x, f = res[1], res[-1] + result = roots(f) + if not result: + for currentroot in _try_decompose(f): + _update_dict(result, zeros, currentroot, 1) + else: + for r in _try_heuristics(f): + _update_dict(result, zeros, r, 1) + else: + for currentroot in _try_decompose(f): + _update_dict(result, zeros, currentroot, 1) + else: + for currentfactor, k in factors: + for r in _try_heuristics(Poly(currentfactor, f.gen, field=True)): + _update_dict(result, zeros, r, k) + + if coeff is not S.One: + _result, result, = result, {} + + for currentroot, k in _result.items(): + result[coeff*currentroot] = k + + if filter not in [None, 'C']: + handlers = { + 'Z': lambda r: r.is_Integer, + 'Q': lambda r: r.is_Rational, + 'R': lambda r: all(a.is_real for a in r.as_numer_denom()), + 'I': lambda r: r.is_imaginary, + } + + try: + query = handlers[filter] + except KeyError: + raise ValueError("Invalid filter: %s" % filter) + + for zero in dict(result).keys(): + if not query(zero): + del result[zero] + + if predicate is not None: + for zero in dict(result).keys(): + if not predicate(zero): + del result[zero] + if rescale_x: + result1 = {} + for k, v in result.items(): + result1[k*rescale_x] = v + result = result1 + if translate_x: + result1 = {} + for k, v in result.items(): + result1[k + translate_x] = v + result = result1 + + # adding zero roots after non-trivial roots have been translated + result.update(zeros) + + if strict and sum(result.values()) < f.degree(): + raise UnsolvableFactorError(filldedent(''' + Strict mode: some factors cannot be solved in radicals, so + a complete list of solutions cannot be returned. Call + roots with strict=False to get solutions expressible in + radicals (if there are any). + ''')) + + if not multiple: + return result + else: + zeros = [] + + for zero in ordered(result): + zeros.extend([zero]*result[zero]) + + return zeros + + +def root_factors(f, *gens, filter=None, **args): + """ + Returns all factors of a univariate polynomial. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.polys.polyroots import root_factors + + >>> root_factors(x**2 - y, x) + [x - sqrt(y), x + sqrt(y)] + + """ + args = dict(args) + + F = Poly(f, *gens, **args) + + if not F.is_Poly: + return [f] + + if F.is_multivariate: + raise ValueError('multivariate polynomials are not supported') + + x = F.gens[0] + + zeros = roots(F, filter=filter) + + if not zeros: + factors = [F] + else: + factors, N = [], 0 + + for r, n in ordered(zeros.items()): + factors, N = factors + [Poly(x - r, x)]*n, N + n + + if N < F.degree(): + G = reduce(lambda p, q: p*q, factors) + factors.append(F.quo(G)) + + if not isinstance(f, Poly): + factors = [ f.as_expr() for f in factors ] + + return factors diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polytools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polytools.py new file mode 100644 index 0000000000000000000000000000000000000000..11b9dd3435f8dc68ea3b0578df9fccfb07dd0f4c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polytools.py @@ -0,0 +1,7960 @@ +"""User-friendly public interface to polynomial functions. """ + +from __future__ import annotations + +from functools import wraps, reduce +from operator import mul +from typing import Optional +from collections import Counter, defaultdict + +from sympy.core import ( + S, Expr, Add, Tuple +) +from sympy.core.basic import Basic +from sympy.core.decorators import _sympifyit +from sympy.core.exprtools import Factors, factor_nc, factor_terms +from sympy.core.evalf import ( + pure_complex, evalf, fastlog, _evalf_with_bounded_error, quad_to_mpmath) +from sympy.core.function import Derivative +from sympy.core.mul import Mul, _keep_coeff +from sympy.core.intfunc import ilcm +from sympy.core.numbers import I, Integer, equal_valued +from sympy.core.relational import Relational, Equality +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy, Symbol +from sympy.core.sympify import sympify, _sympify +from sympy.core.traversal import preorder_traversal, bottom_up +from sympy.logic.boolalg import BooleanAtom +from sympy.polys import polyoptions as options +from sympy.polys.constructor import construct_domain +from sympy.polys.domains import FF, QQ, ZZ +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.fglmtools import matrix_fglm +from sympy.polys.groebnertools import groebner as _groebner +from sympy.polys.monomials import Monomial +from sympy.polys.orderings import monomial_key +from sympy.polys.polyclasses import DMP, DMF, ANP +from sympy.polys.polyerrors import ( + OperationNotSupported, DomainError, + CoercionFailed, UnificationFailed, + GeneratorsNeeded, PolynomialError, + MultivariatePolynomialError, + ExactQuotientFailed, + PolificationFailed, + ComputationFailed, + GeneratorsError, +) +from sympy.polys.polyutils import ( + basic_from_dict, + _sort_gens, + _unify_gens, + _dict_reorder, + _dict_from_expr, + _parallel_dict_from_expr, +) +from sympy.polys.rationaltools import together +from sympy.polys.rootisolation import dup_isolate_real_roots_list +from sympy.utilities import group, public, filldedent +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import iterable, sift + +# Required to avoid errors +import sympy.polys + +import mpmath +from mpmath.libmp.libhyper import NoConvergence + + + +def _polifyit(func): + @wraps(func) + def wrapper(f, g): + g = _sympify(g) + if isinstance(g, Poly): + return func(f, g) + elif isinstance(g, Integer): + g = f.from_expr(g, *f.gens, domain=f.domain) + return func(f, g) + elif isinstance(g, Expr): + try: + g = f.from_expr(g, *f.gens) + except PolynomialError: + if g.is_Matrix: + return NotImplemented + expr_method = getattr(f.as_expr(), func.__name__) + result = expr_method(g) + if result is not NotImplemented: + sympy_deprecation_warning( + """ + Mixing Poly with non-polynomial expressions in binary + operations is deprecated. Either explicitly convert + the non-Poly operand to a Poly with as_poly() or + convert the Poly to an Expr with as_expr(). + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-poly-nonpoly-binary-operations", + ) + return result + else: + return func(f, g) + else: + return NotImplemented + return wrapper + + + +@public +class Poly(Basic): + """ + Generic class for representing and operating on polynomial expressions. + + See :ref:`polys-docs` for general documentation. + + Poly is a subclass of Basic rather than Expr but instances can be + converted to Expr with the :py:meth:`~.Poly.as_expr` method. + + .. deprecated:: 1.6 + + Combining Poly with non-Poly objects in binary operations is + deprecated. Explicitly convert both objects to either Poly or Expr + first. See :ref:`deprecated-poly-nonpoly-binary-operations`. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + Create a univariate polynomial: + + >>> Poly(x*(x**2 + x - 1)**2) + Poly(x**5 + 2*x**4 - x**3 - 2*x**2 + x, x, domain='ZZ') + + Create a univariate polynomial with specific domain: + + >>> from sympy import sqrt + >>> Poly(x**2 + 2*x + sqrt(3), domain='R') + Poly(1.0*x**2 + 2.0*x + 1.73205080756888, x, domain='RR') + + Create a multivariate polynomial: + + >>> Poly(y*x**2 + x*y + 1) + Poly(x**2*y + x*y + 1, x, y, domain='ZZ') + + Create a univariate polynomial, where y is a constant: + + >>> Poly(y*x**2 + x*y + 1,x) + Poly(y*x**2 + y*x + 1, x, domain='ZZ[y]') + + You can evaluate the above polynomial as a function of y: + + >>> Poly(y*x**2 + x*y + 1,x).eval(2) + 6*y + 1 + + See Also + ======== + + sympy.core.expr.Expr + + """ + + __slots__ = ('rep', 'gens') + + is_commutative = True + is_Poly = True + _op_priority = 10.001 + + rep: DMP + gens: tuple[Expr, ...] + + def __new__(cls, rep, *gens, **args) -> Poly: + """Create a new polynomial instance out of something useful. """ + opt = options.build_options(gens, args) + + if 'order' in opt: + raise NotImplementedError("'order' keyword is not implemented yet") + + if isinstance(rep, (DMP, DMF, ANP, DomainElement)): + return cls._from_domain_element(rep, opt) + elif iterable(rep, exclude=str): + if isinstance(rep, dict): + return cls._from_dict(rep, opt) + else: + return cls._from_list(list(rep), opt) + else: + rep = sympify(rep, evaluate=type(rep) is not str) # type: ignore + + if rep.is_Poly: + return cls._from_poly(rep, opt) + else: + return cls._from_expr(rep, opt) + + # Poly does not pass its args to Basic.__new__ to be stored in _args so we + # have to emulate them here with an args property that derives from rep + # and gens which are instance attributes. This also means we need to + # define _hashable_content. The _hashable_content is rep and gens but args + # uses expr instead of rep (expr is the Basic version of rep). Passing + # expr in args means that Basic methods like subs should work. Using rep + # otherwise means that Poly can remain more efficient than Basic by + # avoiding creating a Basic instance just to be hashable. + + @classmethod + def new(cls, rep, *gens): + """Construct :class:`Poly` instance from raw representation. """ + if not isinstance(rep, DMP): + raise PolynomialError( + "invalid polynomial representation: %s" % rep) + elif rep.lev != len(gens) - 1: + raise PolynomialError("invalid arguments: %s, %s" % (rep, gens)) + + obj = Basic.__new__(cls) + obj.rep = rep + obj.gens = gens + + return obj + + @property + def expr(self): + return basic_from_dict(self.rep.to_sympy_dict(), *self.gens) + + @property + def args(self): + return (self.expr,) + self.gens + + def _hashable_content(self): + return (self.rep,) + self.gens + + @classmethod + def from_dict(cls, rep, *gens, **args): + """Construct a polynomial from a ``dict``. """ + opt = options.build_options(gens, args) + return cls._from_dict(rep, opt) + + @classmethod + def from_list(cls, rep, *gens, **args): + """Construct a polynomial from a ``list``. """ + opt = options.build_options(gens, args) + return cls._from_list(rep, opt) + + @classmethod + def from_poly(cls, rep, *gens, **args): + """Construct a polynomial from a polynomial. """ + opt = options.build_options(gens, args) + return cls._from_poly(rep, opt) + + @classmethod + def from_expr(cls, rep, *gens, **args): + """Construct a polynomial from an expression. """ + opt = options.build_options(gens, args) + return cls._from_expr(rep, opt) + + @classmethod + def _from_dict(cls, rep, opt): + """Construct a polynomial from a ``dict``. """ + gens = opt.gens + + if not gens: + raise GeneratorsNeeded( + "Cannot initialize from 'dict' without generators") + + level = len(gens) - 1 + domain = opt.domain + + if domain is None: + domain, rep = construct_domain(rep, opt=opt) + else: + for monom, coeff in rep.items(): + rep[monom] = domain.convert(coeff) + + return cls.new(DMP.from_dict(rep, level, domain), *gens) + + @classmethod + def _from_list(cls, rep, opt): + """Construct a polynomial from a ``list``. """ + gens = opt.gens + + if not gens: + raise GeneratorsNeeded( + "Cannot initialize from 'list' without generators") + elif len(gens) != 1: + raise MultivariatePolynomialError( + "'list' representation not supported") + + level = len(gens) - 1 + domain = opt.domain + + if domain is None: + domain, rep = construct_domain(rep, opt=opt) + else: + rep = list(map(domain.convert, rep)) + + return cls.new(DMP.from_list(rep, level, domain), *gens) + + @classmethod + def _from_poly(cls, rep, opt): + """Construct a polynomial from a polynomial. """ + if cls != rep.__class__: + rep = cls.new(rep.rep, *rep.gens) + + gens = opt.gens + field = opt.field + domain = opt.domain + + if gens and rep.gens != gens: + if set(rep.gens) != set(gens): + return cls._from_expr(rep.as_expr(), opt) + else: + rep = rep.reorder(*gens) + + if 'domain' in opt and domain: + rep = rep.set_domain(domain) + elif field is True: + rep = rep.to_field() + + return rep + + @classmethod + def _from_expr(cls, rep, opt): + """Construct a polynomial from an expression. """ + rep, opt = _dict_from_expr(rep, opt) + return cls._from_dict(rep, opt) + + @classmethod + def _from_domain_element(cls, rep, opt): + gens = opt.gens + domain = opt.domain + + level = len(gens) - 1 + rep = [domain.convert(rep)] + + return cls.new(DMP.from_list(rep, level, domain), *gens) + + def __hash__(self): + return super().__hash__() + + @property + def free_symbols(self): + """ + Free symbols of a polynomial expression. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> Poly(x**2 + 1).free_symbols + {x} + >>> Poly(x**2 + y).free_symbols + {x, y} + >>> Poly(x**2 + y, x).free_symbols + {x, y} + >>> Poly(x**2 + y, x, z).free_symbols + {x, y} + + """ + symbols = set() + gens = self.gens + for i in range(len(gens)): + for monom in self.monoms(): + if monom[i]: + symbols |= gens[i].free_symbols + break + + return symbols | self.free_symbols_in_domain + + @property + def free_symbols_in_domain(self): + """ + Free symbols of the domain of ``self``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 1).free_symbols_in_domain + set() + >>> Poly(x**2 + y).free_symbols_in_domain + set() + >>> Poly(x**2 + y, x).free_symbols_in_domain + {y} + + """ + domain, symbols = self.rep.dom, set() + + if domain.is_Composite: + for gen in domain.symbols: + symbols |= gen.free_symbols + elif domain.is_EX: + for coeff in self.coeffs(): + symbols |= coeff.free_symbols + + return symbols + + @property + def gen(self): + """ + Return the principal generator. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).gen + x + + """ + return self.gens[0] + + @property + def domain(self): + """Get the ground domain of a :py:class:`~.Poly` + + Returns + ======= + + :py:class:`~.Domain`: + Ground domain of the :py:class:`~.Poly`. + + Examples + ======== + + >>> from sympy import Poly, Symbol + >>> x = Symbol('x') + >>> p = Poly(x**2 + x) + >>> p + Poly(x**2 + x, x, domain='ZZ') + >>> p.domain + ZZ + """ + return self.get_domain() + + @property + def zero(self): + """Return zero polynomial with ``self``'s properties. """ + return self.new(self.rep.zero(self.rep.lev, self.rep.dom), *self.gens) + + @property + def one(self): + """Return one polynomial with ``self``'s properties. """ + return self.new(self.rep.one(self.rep.lev, self.rep.dom), *self.gens) + + def unify(f, g): + """ + Make ``f`` and ``g`` belong to the same domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f, g = Poly(x/2 + 1), Poly(2*x + 1) + + >>> f + Poly(1/2*x + 1, x, domain='QQ') + >>> g + Poly(2*x + 1, x, domain='ZZ') + + >>> F, G = f.unify(g) + + >>> F + Poly(1/2*x + 1, x, domain='QQ') + >>> G + Poly(2*x + 1, x, domain='QQ') + + """ + _, per, F, G = f._unify(g) + return per(F), per(G) + + def _unify(f, g): + g = sympify(g) + + if not g.is_Poly: + try: + g_coeff = f.rep.dom.from_sympy(g) + except CoercionFailed: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + else: + return f.rep.dom, f.per, f.rep, f.rep.ground_new(g_coeff) + + if isinstance(f.rep, DMP) and isinstance(g.rep, DMP): + gens = _unify_gens(f.gens, g.gens) + + dom, lev = f.rep.dom.unify(g.rep.dom, gens), len(gens) - 1 + + if f.gens != gens: + f_monoms, f_coeffs = _dict_reorder( + f.rep.to_dict(), f.gens, gens) + + if f.rep.dom != dom: + f_coeffs = [dom.convert(c, f.rep.dom) for c in f_coeffs] + + F = DMP.from_dict(dict(list(zip(f_monoms, f_coeffs))), lev, dom) + else: + F = f.rep.convert(dom) + + if g.gens != gens: + g_monoms, g_coeffs = _dict_reorder( + g.rep.to_dict(), g.gens, gens) + + if g.rep.dom != dom: + g_coeffs = [dom.convert(c, g.rep.dom) for c in g_coeffs] + + G = DMP.from_dict(dict(list(zip(g_monoms, g_coeffs))), lev, dom) + else: + G = g.rep.convert(dom) + else: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + cls = f.__class__ + + def per(rep, dom=dom, gens=gens, remove=None): + if remove is not None: + gens = gens[:remove] + gens[remove + 1:] + + if not gens: + return dom.to_sympy(rep) + + return cls.new(rep, *gens) + + return dom, per, F, G + + def per(f, rep, gens=None, remove=None): + """ + Create a Poly out of the given representation. + + Examples + ======== + + >>> from sympy import Poly, ZZ + >>> from sympy.abc import x, y + + >>> from sympy.polys.polyclasses import DMP + + >>> a = Poly(x**2 + 1) + + >>> a.per(DMP([ZZ(1), ZZ(1)], ZZ), gens=[y]) + Poly(y + 1, y, domain='ZZ') + + """ + if gens is None: + gens = f.gens + + if remove is not None: + gens = gens[:remove] + gens[remove + 1:] + + if not gens: + return f.rep.dom.to_sympy(rep) + + return f.__class__.new(rep, *gens) + + def set_domain(f, domain): + """Set the ground domain of ``f``. """ + opt = options.build_options(f.gens, {'domain': domain}) + return f.per(f.rep.convert(opt.domain)) + + def get_domain(f): + """Get the ground domain of ``f``. """ + return f.rep.dom + + def set_modulus(f, modulus): + """ + Set the modulus of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(5*x**2 + 2*x - 1, x).set_modulus(2) + Poly(x**2 + 1, x, modulus=2) + + """ + modulus = options.Modulus.preprocess(modulus) + return f.set_domain(FF(modulus)) + + def get_modulus(f): + """ + Get the modulus of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, modulus=2).get_modulus() + 2 + + """ + domain = f.get_domain() + + if domain.is_FiniteField: + return Integer(domain.characteristic()) + else: + raise PolynomialError("not a polynomial over a Galois field") + + def _eval_subs(f, old, new): + """Internal implementation of :func:`subs`. """ + if old in f.gens: + if new.is_number: + return f.eval(old, new) + else: + try: + return f.replace(old, new) + except PolynomialError: + pass + + return f.as_expr().subs(old, new) + + def exclude(f): + """ + Remove unnecessary generators from ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import a, b, c, d, x + + >>> Poly(a + x, a, b, c, d, x).exclude() + Poly(a + x, a, x, domain='ZZ') + + """ + J, new = f.rep.exclude() + gens = [gen for j, gen in enumerate(f.gens) if j not in J] + + return f.per(new, gens=gens) + + def replace(f, x, y=None, **_ignore): + # XXX this does not match Basic's signature + """ + Replace ``x`` with ``y`` in generators list. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 1, x).replace(x, y) + Poly(y**2 + 1, y, domain='ZZ') + + """ + if y is None: + if f.is_univariate: + x, y = f.gen, x + else: + raise PolynomialError( + "syntax supported only in univariate case") + + if x == y or x not in f.gens: + return f + + if x in f.gens and y not in f.gens: + dom = f.get_domain() + + if not dom.is_Composite or y not in dom.symbols: + gens = list(f.gens) + gens[gens.index(x)] = y + return f.per(f.rep, gens=gens) + + raise PolynomialError("Cannot replace %s with %s in %s" % (x, y, f)) + + def match(f, *args, **kwargs): + """Match expression from Poly. See Basic.match()""" + return f.as_expr().match(*args, **kwargs) + + def reorder(f, *gens, **args): + """ + Efficiently apply new order of generators. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + x*y**2, x, y).reorder(y, x) + Poly(y**2*x + x**2, y, x, domain='ZZ') + + """ + opt = options.Options((), args) + + if not gens: + gens = _sort_gens(f.gens, opt=opt) + elif set(f.gens) != set(gens): + raise PolynomialError( + "generators list can differ only up to order of elements") + + rep = dict(list(zip(*_dict_reorder(f.rep.to_dict(), f.gens, gens)))) + + return f.per(DMP.from_dict(rep, len(gens) - 1, f.rep.dom), gens=gens) + + def ltrim(f, gen): + """ + Remove dummy generators from ``f`` that are to the left of + specified ``gen`` in the generators as ordered. When ``gen`` + is an integer, it refers to the generator located at that + position within the tuple of generators of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> Poly(y**2 + y*z**2, x, y, z).ltrim(y) + Poly(y**2 + y*z**2, y, z, domain='ZZ') + >>> Poly(z, x, y, z).ltrim(-1) + Poly(z, z, domain='ZZ') + + """ + rep = f.as_dict(native=True) + j = f._gen_to_level(gen) + + terms = {} + + for monom, coeff in rep.items(): + + if any(monom[:j]): + # some generator is used in the portion to be trimmed + raise PolynomialError("Cannot left trim %s" % f) + + terms[monom[j:]] = coeff + + gens = f.gens[j:] + + return f.new(DMP.from_dict(terms, len(gens) - 1, f.rep.dom), *gens) + + def has_only_gens(f, *gens): + """ + Return ``True`` if ``Poly(f, *gens)`` retains ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> Poly(x*y + 1, x, y, z).has_only_gens(x, y) + True + >>> Poly(x*y + z, x, y, z).has_only_gens(x, y) + False + + """ + indices = set() + + for gen in gens: + try: + index = f.gens.index(gen) + except ValueError: + raise GeneratorsError( + "%s doesn't have %s as generator" % (f, gen)) + else: + indices.add(index) + + for monom in f.monoms(): + for i, elt in enumerate(monom): + if i not in indices and elt: + return False + + return True + + def to_ring(f): + """ + Make the ground domain a ring. + + Examples + ======== + + >>> from sympy import Poly, QQ + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, domain=QQ).to_ring() + Poly(x**2 + 1, x, domain='ZZ') + + """ + if hasattr(f.rep, 'to_ring'): + result = f.rep.to_ring() + else: # pragma: no cover + raise OperationNotSupported(f, 'to_ring') + + return f.per(result) + + def to_field(f): + """ + Make the ground domain a field. + + Examples + ======== + + >>> from sympy import Poly, ZZ + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x, domain=ZZ).to_field() + Poly(x**2 + 1, x, domain='QQ') + + """ + if hasattr(f.rep, 'to_field'): + result = f.rep.to_field() + else: # pragma: no cover + raise OperationNotSupported(f, 'to_field') + + return f.per(result) + + def to_exact(f): + """ + Make the ground domain exact. + + Examples + ======== + + >>> from sympy import Poly, RR + >>> from sympy.abc import x + + >>> Poly(x**2 + 1.0, x, domain=RR).to_exact() + Poly(x**2 + 1, x, domain='QQ') + + """ + if hasattr(f.rep, 'to_exact'): + result = f.rep.to_exact() + else: # pragma: no cover + raise OperationNotSupported(f, 'to_exact') + + return f.per(result) + + def retract(f, field=None): + """ + Recalculate the ground domain of a polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = Poly(x**2 + 1, x, domain='QQ[y]') + >>> f + Poly(x**2 + 1, x, domain='QQ[y]') + + >>> f.retract() + Poly(x**2 + 1, x, domain='ZZ') + >>> f.retract(field=True) + Poly(x**2 + 1, x, domain='QQ') + + """ + dom, rep = construct_domain(f.as_dict(zero=True), + field=field, composite=f.domain.is_Composite or None) + return f.from_dict(rep, f.gens, domain=dom) + + def slice(f, x, m, n=None): + """Take a continuous subsequence of terms of ``f``. """ + if n is None: + j, m, n = 0, x, m + else: + j = f._gen_to_level(x) + + m, n = int(m), int(n) + + if hasattr(f.rep, 'slice'): + result = f.rep.slice(m, n, j) + else: # pragma: no cover + raise OperationNotSupported(f, 'slice') + + return f.per(result) + + def coeffs(f, order=None): + """ + Returns all non-zero coefficients from ``f`` in lex order. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x + 3, x).coeffs() + [1, 2, 3] + + See Also + ======== + all_coeffs + coeff_monomial + nth + + """ + return [f.rep.dom.to_sympy(c) for c in f.rep.coeffs(order=order)] + + def monoms(f, order=None): + """ + Returns all non-zero monomials from ``f`` in lex order. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 2*x*y**2 + x*y + 3*y, x, y).monoms() + [(2, 0), (1, 2), (1, 1), (0, 1)] + + See Also + ======== + all_monoms + + """ + return f.rep.monoms(order=order) + + def terms(f, order=None): + """ + Returns all non-zero terms from ``f`` in lex order. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 2*x*y**2 + x*y + 3*y, x, y).terms() + [((2, 0), 1), ((1, 2), 2), ((1, 1), 1), ((0, 1), 3)] + + See Also + ======== + all_terms + + """ + return [(m, f.rep.dom.to_sympy(c)) for m, c in f.rep.terms(order=order)] + + def all_coeffs(f): + """ + Returns all coefficients from a univariate polynomial ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x - 1, x).all_coeffs() + [1, 0, 2, -1] + + """ + return [f.rep.dom.to_sympy(c) for c in f.rep.all_coeffs()] + + def all_monoms(f): + """ + Returns all monomials from a univariate polynomial ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x - 1, x).all_monoms() + [(3,), (2,), (1,), (0,)] + + See Also + ======== + all_terms + + """ + return f.rep.all_monoms() + + def all_terms(f): + """ + Returns all terms from a univariate polynomial ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x - 1, x).all_terms() + [((3,), 1), ((2,), 0), ((1,), 2), ((0,), -1)] + + """ + return [(m, f.rep.dom.to_sympy(c)) for m, c in f.rep.all_terms()] + + def termwise(f, func, *gens, **args): + """ + Apply a function to all terms of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> def func(k, coeff): + ... k = k[0] + ... return coeff//10**(2-k) + + >>> Poly(x**2 + 20*x + 400).termwise(func) + Poly(x**2 + 2*x + 4, x, domain='ZZ') + + """ + terms = {} + + for monom, coeff in f.terms(): + result = func(monom, coeff) + + if isinstance(result, tuple): + monom, coeff = result + else: + coeff = result + + if coeff: + if monom not in terms: + terms[monom] = coeff + else: + raise PolynomialError( + "%s monomial was generated twice" % monom) + + return f.from_dict(terms, *(gens or f.gens), **args) + + def length(f): + """ + Returns the number of non-zero terms in ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 2*x - 1).length() + 3 + + """ + return len(f.as_dict()) + + def as_dict(f, native=False, zero=False): + """ + Switch to a ``dict`` representation. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 2*x*y**2 - y, x, y).as_dict() + {(0, 1): -1, (1, 2): 2, (2, 0): 1} + + """ + if native: + return f.rep.to_dict(zero=zero) + else: + return f.rep.to_sympy_dict(zero=zero) + + def as_list(f, native=False): + """Switch to a ``list`` representation. """ + if native: + return f.rep.to_list() + else: + return f.rep.to_sympy_list() + + def as_expr(f, *gens): + """ + Convert a Poly instance to an Expr instance. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = Poly(x**2 + 2*x*y**2 - y, x, y) + + >>> f.as_expr() + x**2 + 2*x*y**2 - y + >>> f.as_expr({x: 5}) + 10*y**2 - y + 25 + >>> f.as_expr(5, 6) + 379 + + """ + if not gens: + return f.expr + + if len(gens) == 1 and isinstance(gens[0], dict): + mapping = gens[0] + gens = list(f.gens) + + for gen, value in mapping.items(): + try: + index = gens.index(gen) + except ValueError: + raise GeneratorsError( + "%s doesn't have %s as generator" % (f, gen)) + else: + gens[index] = value + + return basic_from_dict(f.rep.to_sympy_dict(), *gens) + + def as_poly(self, *gens, **args): + """Converts ``self`` to a polynomial or returns ``None``. + + >>> from sympy import sin + >>> from sympy.abc import x, y + + >>> print((x**2 + x*y).as_poly()) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + x*y).as_poly(x, y)) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + sin(y)).as_poly(x, y)) + None + + """ + try: + poly = Poly(self, *gens, **args) + + if not poly.is_Poly: + return None + else: + return poly + except PolynomialError: + return None + + def lift(f): + """ + Convert algebraic coefficients to rationals. + + Examples + ======== + + >>> from sympy import Poly, I + >>> from sympy.abc import x + + >>> Poly(x**2 + I*x + 1, x, extension=I).lift() + Poly(x**4 + 3*x**2 + 1, x, domain='QQ') + + """ + if hasattr(f.rep, 'lift'): + result = f.rep.lift() + else: # pragma: no cover + raise OperationNotSupported(f, 'lift') + + return f.per(result) + + def deflate(f): + """ + Reduce degree of ``f`` by mapping ``x_i**m`` to ``y_i``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**6*y**2 + x**3 + 1, x, y).deflate() + ((3, 2), Poly(x**2*y + x + 1, x, y, domain='ZZ')) + + """ + if hasattr(f.rep, 'deflate'): + J, result = f.rep.deflate() + else: # pragma: no cover + raise OperationNotSupported(f, 'deflate') + + return J, f.per(result) + + def inject(f, front=False): + """ + Inject ground domain generators into ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = Poly(x**2*y + x*y**3 + x*y + 1, x) + + >>> f.inject() + Poly(x**2*y + x*y**3 + x*y + 1, x, y, domain='ZZ') + >>> f.inject(front=True) + Poly(y**3*x + y*x**2 + y*x + 1, y, x, domain='ZZ') + + """ + dom = f.rep.dom + + if dom.is_Numerical: + return f + elif not dom.is_Poly: + raise DomainError("Cannot inject generators over %s" % dom) + + if hasattr(f.rep, 'inject'): + result = f.rep.inject(front=front) + else: # pragma: no cover + raise OperationNotSupported(f, 'inject') + + if front: + gens = dom.symbols + f.gens + else: + gens = f.gens + dom.symbols + + return f.new(result, *gens) + + def eject(f, *gens): + """ + Eject selected generators into the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = Poly(x**2*y + x*y**3 + x*y + 1, x, y) + + >>> f.eject(x) + Poly(x*y**3 + (x**2 + x)*y + 1, y, domain='ZZ[x]') + >>> f.eject(y) + Poly(y*x**2 + (y**3 + y)*x + 1, x, domain='ZZ[y]') + + """ + dom = f.rep.dom + + if not dom.is_Numerical: + raise DomainError("Cannot eject generators over %s" % dom) + + k = len(gens) + + if f.gens[:k] == gens: + _gens, front = f.gens[k:], True + elif f.gens[-k:] == gens: + _gens, front = f.gens[:-k], False + else: + raise NotImplementedError( + "can only eject front or back generators") + + dom = dom.inject(*gens) + + if hasattr(f.rep, 'eject'): + result = f.rep.eject(dom, front=front) + else: # pragma: no cover + raise OperationNotSupported(f, 'eject') + + return f.new(result, *_gens) + + def terms_gcd(f): + """ + Remove GCD of terms from the polynomial ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**6*y**2 + x**3*y, x, y).terms_gcd() + ((3, 1), Poly(x**3*y + 1, x, y, domain='ZZ')) + + """ + if hasattr(f.rep, 'terms_gcd'): + J, result = f.rep.terms_gcd() + else: # pragma: no cover + raise OperationNotSupported(f, 'terms_gcd') + + return J, f.per(result) + + def add_ground(f, coeff): + """ + Add an element of the ground domain to ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x + 1).add_ground(2) + Poly(x + 3, x, domain='ZZ') + + """ + if hasattr(f.rep, 'add_ground'): + result = f.rep.add_ground(coeff) + else: # pragma: no cover + raise OperationNotSupported(f, 'add_ground') + + return f.per(result) + + def sub_ground(f, coeff): + """ + Subtract an element of the ground domain from ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x + 1).sub_ground(2) + Poly(x - 1, x, domain='ZZ') + + """ + if hasattr(f.rep, 'sub_ground'): + result = f.rep.sub_ground(coeff) + else: # pragma: no cover + raise OperationNotSupported(f, 'sub_ground') + + return f.per(result) + + def mul_ground(f, coeff): + """ + Multiply ``f`` by a an element of the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x + 1).mul_ground(2) + Poly(2*x + 2, x, domain='ZZ') + + """ + if hasattr(f.rep, 'mul_ground'): + result = f.rep.mul_ground(coeff) + else: # pragma: no cover + raise OperationNotSupported(f, 'mul_ground') + + return f.per(result) + + def quo_ground(f, coeff): + """ + Quotient of ``f`` by a an element of the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x + 4).quo_ground(2) + Poly(x + 2, x, domain='ZZ') + + >>> Poly(2*x + 3).quo_ground(2) + Poly(x + 1, x, domain='ZZ') + + """ + if hasattr(f.rep, 'quo_ground'): + result = f.rep.quo_ground(coeff) + else: # pragma: no cover + raise OperationNotSupported(f, 'quo_ground') + + return f.per(result) + + def exquo_ground(f, coeff): + """ + Exact quotient of ``f`` by a an element of the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x + 4).exquo_ground(2) + Poly(x + 2, x, domain='ZZ') + + >>> Poly(2*x + 3).exquo_ground(2) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2 does not divide 3 in ZZ + + """ + if hasattr(f.rep, 'exquo_ground'): + result = f.rep.exquo_ground(coeff) + else: # pragma: no cover + raise OperationNotSupported(f, 'exquo_ground') + + return f.per(result) + + def abs(f): + """ + Make all coefficients in ``f`` positive. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).abs() + Poly(x**2 + 1, x, domain='ZZ') + + """ + if hasattr(f.rep, 'abs'): + result = f.rep.abs() + else: # pragma: no cover + raise OperationNotSupported(f, 'abs') + + return f.per(result) + + def neg(f): + """ + Negate all coefficients in ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).neg() + Poly(-x**2 + 1, x, domain='ZZ') + + >>> -Poly(x**2 - 1, x) + Poly(-x**2 + 1, x, domain='ZZ') + + """ + if hasattr(f.rep, 'neg'): + result = f.rep.neg() + else: # pragma: no cover + raise OperationNotSupported(f, 'neg') + + return f.per(result) + + def add(f, g): + """ + Add two polynomials ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).add(Poly(x - 2, x)) + Poly(x**2 + x - 1, x, domain='ZZ') + + >>> Poly(x**2 + 1, x) + Poly(x - 2, x) + Poly(x**2 + x - 1, x, domain='ZZ') + + """ + g = sympify(g) + + if not g.is_Poly: + return f.add_ground(g) + + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'add'): + result = F.add(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'add') + + return per(result) + + def sub(f, g): + """ + Subtract two polynomials ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).sub(Poly(x - 2, x)) + Poly(x**2 - x + 3, x, domain='ZZ') + + >>> Poly(x**2 + 1, x) - Poly(x - 2, x) + Poly(x**2 - x + 3, x, domain='ZZ') + + """ + g = sympify(g) + + if not g.is_Poly: + return f.sub_ground(g) + + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'sub'): + result = F.sub(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'sub') + + return per(result) + + def mul(f, g): + """ + Multiply two polynomials ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).mul(Poly(x - 2, x)) + Poly(x**3 - 2*x**2 + x - 2, x, domain='ZZ') + + >>> Poly(x**2 + 1, x)*Poly(x - 2, x) + Poly(x**3 - 2*x**2 + x - 2, x, domain='ZZ') + + """ + g = sympify(g) + + if not g.is_Poly: + return f.mul_ground(g) + + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'mul'): + result = F.mul(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'mul') + + return per(result) + + def sqr(f): + """ + Square a polynomial ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x - 2, x).sqr() + Poly(x**2 - 4*x + 4, x, domain='ZZ') + + >>> Poly(x - 2, x)**2 + Poly(x**2 - 4*x + 4, x, domain='ZZ') + + """ + if hasattr(f.rep, 'sqr'): + result = f.rep.sqr() + else: # pragma: no cover + raise OperationNotSupported(f, 'sqr') + + return f.per(result) + + def pow(f, n): + """ + Raise ``f`` to a non-negative power ``n``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x - 2, x).pow(3) + Poly(x**3 - 6*x**2 + 12*x - 8, x, domain='ZZ') + + >>> Poly(x - 2, x)**3 + Poly(x**3 - 6*x**2 + 12*x - 8, x, domain='ZZ') + + """ + n = int(n) + + if hasattr(f.rep, 'pow'): + result = f.rep.pow(n) + else: # pragma: no cover + raise OperationNotSupported(f, 'pow') + + return f.per(result) + + def pdiv(f, g): + """ + Polynomial pseudo-division of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).pdiv(Poly(2*x - 4, x)) + (Poly(2*x + 4, x, domain='ZZ'), Poly(20, x, domain='ZZ')) + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'pdiv'): + q, r = F.pdiv(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'pdiv') + + return per(q), per(r) + + def prem(f, g): + """ + Polynomial pseudo-remainder of ``f`` by ``g``. + + Caveat: The function prem(f, g, x) can be safely used to compute + in Z[x] _only_ subresultant polynomial remainder sequences (prs's). + + To safely compute Euclidean and Sturmian prs's in Z[x] + employ anyone of the corresponding functions found in + the module sympy.polys.subresultants_qq_zz. The functions + in the module with suffix _pg compute prs's in Z[x] employing + rem(f, g, x), whereas the functions with suffix _amv + compute prs's in Z[x] employing rem_z(f, g, x). + + The function rem_z(f, g, x) differs from prem(f, g, x) in that + to compute the remainder polynomials in Z[x] it premultiplies + the divident times the absolute value of the leading coefficient + of the divisor raised to the power degree(f, x) - degree(g, x) + 1. + + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).prem(Poly(2*x - 4, x)) + Poly(20, x, domain='ZZ') + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'prem'): + result = F.prem(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'prem') + + return per(result) + + def pquo(f, g): + """ + Polynomial pseudo-quotient of ``f`` by ``g``. + + See the Caveat note in the function prem(f, g). + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).pquo(Poly(2*x - 4, x)) + Poly(2*x + 4, x, domain='ZZ') + + >>> Poly(x**2 - 1, x).pquo(Poly(2*x - 2, x)) + Poly(2*x + 2, x, domain='ZZ') + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'pquo'): + result = F.pquo(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'pquo') + + return per(result) + + def pexquo(f, g): + """ + Polynomial exact pseudo-quotient of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).pexquo(Poly(2*x - 2, x)) + Poly(2*x + 2, x, domain='ZZ') + + >>> Poly(x**2 + 1, x).pexquo(Poly(2*x - 4, x)) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1 + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'pexquo'): + try: + result = F.pexquo(G) + except ExactQuotientFailed as exc: + raise exc.new(f.as_expr(), g.as_expr()) + else: # pragma: no cover + raise OperationNotSupported(f, 'pexquo') + + return per(result) + + def div(f, g, auto=True): + """ + Polynomial division with remainder of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).div(Poly(2*x - 4, x)) + (Poly(1/2*x + 1, x, domain='QQ'), Poly(5, x, domain='QQ')) + + >>> Poly(x**2 + 1, x).div(Poly(2*x - 4, x), auto=False) + (Poly(0, x, domain='ZZ'), Poly(x**2 + 1, x, domain='ZZ')) + + """ + dom, per, F, G = f._unify(g) + retract = False + + if auto and dom.is_Ring and not dom.is_Field: + F, G = F.to_field(), G.to_field() + retract = True + + if hasattr(f.rep, 'div'): + q, r = F.div(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'div') + + if retract: + try: + Q, R = q.to_ring(), r.to_ring() + except CoercionFailed: + pass + else: + q, r = Q, R + + return per(q), per(r) + + def rem(f, g, auto=True): + """ + Computes the polynomial remainder of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).rem(Poly(2*x - 4, x)) + Poly(5, x, domain='ZZ') + + >>> Poly(x**2 + 1, x).rem(Poly(2*x - 4, x), auto=False) + Poly(x**2 + 1, x, domain='ZZ') + + """ + dom, per, F, G = f._unify(g) + retract = False + + if auto and dom.is_Ring and not dom.is_Field: + F, G = F.to_field(), G.to_field() + retract = True + + if hasattr(f.rep, 'rem'): + r = F.rem(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'rem') + + if retract: + try: + r = r.to_ring() + except CoercionFailed: + pass + + return per(r) + + def quo(f, g, auto=True): + """ + Computes polynomial quotient of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).quo(Poly(2*x - 4, x)) + Poly(1/2*x + 1, x, domain='QQ') + + >>> Poly(x**2 - 1, x).quo(Poly(x - 1, x)) + Poly(x + 1, x, domain='ZZ') + + """ + dom, per, F, G = f._unify(g) + retract = False + + if auto and dom.is_Ring and not dom.is_Field: + F, G = F.to_field(), G.to_field() + retract = True + + if hasattr(f.rep, 'quo'): + q = F.quo(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'quo') + + if retract: + try: + q = q.to_ring() + except CoercionFailed: + pass + + return per(q) + + def exquo(f, g, auto=True): + """ + Computes polynomial exact quotient of ``f`` by ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).exquo(Poly(x - 1, x)) + Poly(x + 1, x, domain='ZZ') + + >>> Poly(x**2 + 1, x).exquo(Poly(2*x - 4, x)) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1 + + """ + dom, per, F, G = f._unify(g) + retract = False + + if auto and dom.is_Ring and not dom.is_Field: + F, G = F.to_field(), G.to_field() + retract = True + + if hasattr(f.rep, 'exquo'): + try: + q = F.exquo(G) + except ExactQuotientFailed as exc: + raise exc.new(f.as_expr(), g.as_expr()) + else: # pragma: no cover + raise OperationNotSupported(f, 'exquo') + + if retract: + try: + q = q.to_ring() + except CoercionFailed: + pass + + return per(q) + + def _gen_to_level(f, gen): + """Returns level associated with the given generator. """ + if isinstance(gen, int): + length = len(f.gens) + + if -length <= gen < length: + if gen < 0: + return length + gen + else: + return gen + else: + raise PolynomialError("-%s <= gen < %s expected, got %s" % + (length, length, gen)) + else: + try: + return f.gens.index(sympify(gen)) + except ValueError: + raise PolynomialError( + "a valid generator expected, got %s" % gen) + + def degree(f, gen=0): + """ + Returns degree of ``f`` in ``x_j``. + + The degree of 0 is negative infinity. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + y*x + 1, x, y).degree() + 2 + >>> Poly(x**2 + y*x + y, x, y).degree(y) + 1 + >>> Poly(0, x).degree() + -oo + + """ + j = f._gen_to_level(gen) + + if hasattr(f.rep, 'degree'): + d = f.rep.degree(j) + if d < 0: + d = S.NegativeInfinity + return d + else: # pragma: no cover + raise OperationNotSupported(f, 'degree') + + def degree_list(f): + """ + Returns a list of degrees of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + y*x + 1, x, y).degree_list() + (2, 1) + + """ + if hasattr(f.rep, 'degree_list'): + return f.rep.degree_list() + else: # pragma: no cover + raise OperationNotSupported(f, 'degree_list') + + def total_degree(f): + """ + Returns the total degree of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + y*x + 1, x, y).total_degree() + 2 + >>> Poly(x + y**5, x, y).total_degree() + 5 + + """ + if hasattr(f.rep, 'total_degree'): + return f.rep.total_degree() + else: # pragma: no cover + raise OperationNotSupported(f, 'total_degree') + + def homogenize(f, s): + """ + Returns the homogeneous polynomial of ``f``. + + A homogeneous polynomial is a polynomial whose all monomials with + non-zero coefficients have the same total degree. If you only + want to check if a polynomial is homogeneous, then use + :func:`Poly.is_homogeneous`. If you want not only to check if a + polynomial is homogeneous but also compute its homogeneous order, + then use :func:`Poly.homogeneous_order`. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> f = Poly(x**5 + 2*x**2*y**2 + 9*x*y**3) + >>> f.homogenize(z) + Poly(x**5 + 2*x**2*y**2*z + 9*x*y**3*z, x, y, z, domain='ZZ') + + """ + if not isinstance(s, Symbol): + raise TypeError("``Symbol`` expected, got %s" % type(s)) + if s in f.gens: + i = f.gens.index(s) + gens = f.gens + else: + i = len(f.gens) + gens = f.gens + (s,) + if hasattr(f.rep, 'homogenize'): + return f.per(f.rep.homogenize(i), gens=gens) + raise OperationNotSupported(f, 'homogeneous_order') + + def homogeneous_order(f): + """ + Returns the homogeneous order of ``f``. + + A homogeneous polynomial is a polynomial whose all monomials with + non-zero coefficients have the same total degree. This degree is + the homogeneous order of ``f``. If you only want to check if a + polynomial is homogeneous, then use :func:`Poly.is_homogeneous`. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = Poly(x**5 + 2*x**3*y**2 + 9*x*y**4) + >>> f.homogeneous_order() + 5 + + """ + if hasattr(f.rep, 'homogeneous_order'): + return f.rep.homogeneous_order() + else: # pragma: no cover + raise OperationNotSupported(f, 'homogeneous_order') + + def LC(f, order=None): + """ + Returns the leading coefficient of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(4*x**3 + 2*x**2 + 3*x, x).LC() + 4 + + """ + if order is not None: + return f.coeffs(order)[0] + + if hasattr(f.rep, 'LC'): + result = f.rep.LC() + else: # pragma: no cover + raise OperationNotSupported(f, 'LC') + + return f.rep.dom.to_sympy(result) + + def TC(f): + """ + Returns the trailing coefficient of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x**2 + 3*x, x).TC() + 0 + + """ + if hasattr(f.rep, 'TC'): + result = f.rep.TC() + else: # pragma: no cover + raise OperationNotSupported(f, 'TC') + + return f.rep.dom.to_sympy(result) + + def EC(f, order=None): + """ + Returns the last non-zero coefficient of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 + 2*x**2 + 3*x, x).EC() + 3 + + """ + if hasattr(f.rep, 'coeffs'): + return f.coeffs(order)[-1] + else: # pragma: no cover + raise OperationNotSupported(f, 'EC') + + def coeff_monomial(f, monom): + """ + Returns the coefficient of ``monom`` in ``f`` if there, else None. + + Examples + ======== + + >>> from sympy import Poly, exp + >>> from sympy.abc import x, y + + >>> p = Poly(24*x*y*exp(8) + 23*x, x, y) + + >>> p.coeff_monomial(x) + 23 + >>> p.coeff_monomial(y) + 0 + >>> p.coeff_monomial(x*y) + 24*exp(8) + + Note that ``Expr.coeff()`` behaves differently, collecting terms + if possible; the Poly must be converted to an Expr to use that + method, however: + + >>> p.as_expr().coeff(x) + 24*y*exp(8) + 23 + >>> p.as_expr().coeff(y) + 24*x*exp(8) + >>> p.as_expr().coeff(x*y) + 24*exp(8) + + See Also + ======== + nth: more efficient query using exponents of the monomial's generators + + """ + return f.nth(*Monomial(monom, f.gens).exponents) + + def nth(f, *N): + """ + Returns the ``n``-th coefficient of ``f`` where ``N`` are the + exponents of the generators in the term of interest. + + Examples + ======== + + >>> from sympy import Poly, sqrt + >>> from sympy.abc import x, y + + >>> Poly(x**3 + 2*x**2 + 3*x, x).nth(2) + 2 + >>> Poly(x**3 + 2*x*y**2 + y**2, x, y).nth(1, 2) + 2 + >>> Poly(4*sqrt(x)*y) + Poly(4*y*(sqrt(x)), y, sqrt(x), domain='ZZ') + >>> _.nth(1, 1) + 4 + + See Also + ======== + coeff_monomial + + """ + if hasattr(f.rep, 'nth'): + if len(N) != len(f.gens): + raise ValueError('exponent of each generator must be specified') + result = f.rep.nth(*list(map(int, N))) + else: # pragma: no cover + raise OperationNotSupported(f, 'nth') + + return f.rep.dom.to_sympy(result) + + def coeff(f, x, n=1, right=False): + # the semantics of coeff_monomial and Expr.coeff are different; + # if someone is working with a Poly, they should be aware of the + # differences and chose the method best suited for the query. + # Alternatively, a pure-polys method could be written here but + # at this time the ``right`` keyword would be ignored because Poly + # doesn't work with non-commutatives. + raise NotImplementedError( + 'Either convert to Expr with `as_expr` method ' + 'to use Expr\'s coeff method or else use the ' + '`coeff_monomial` method of Polys.') + + def LM(f, order=None): + """ + Returns the leading monomial of ``f``. + + The Leading monomial signifies the monomial having + the highest power of the principal generator in the + expression f. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).LM() + x**2*y**0 + + """ + return Monomial(f.monoms(order)[0], f.gens) + + def EM(f, order=None): + """ + Returns the last non-zero monomial of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).EM() + x**0*y**1 + + """ + return Monomial(f.monoms(order)[-1], f.gens) + + def LT(f, order=None): + """ + Returns the leading term of ``f``. + + The Leading term signifies the term having + the highest power of the principal generator in the + expression f along with its coefficient. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).LT() + (x**2*y**0, 4) + + """ + monom, coeff = f.terms(order)[0] + return Monomial(monom, f.gens), coeff + + def ET(f, order=None): + """ + Returns the last non-zero term of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).ET() + (x**0*y**1, 3) + + """ + monom, coeff = f.terms(order)[-1] + return Monomial(monom, f.gens), coeff + + def max_norm(f): + """ + Returns maximum norm of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(-x**2 + 2*x - 3, x).max_norm() + 3 + + """ + if hasattr(f.rep, 'max_norm'): + result = f.rep.max_norm() + else: # pragma: no cover + raise OperationNotSupported(f, 'max_norm') + + return f.rep.dom.to_sympy(result) + + def l1_norm(f): + """ + Returns l1 norm of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(-x**2 + 2*x - 3, x).l1_norm() + 6 + + """ + if hasattr(f.rep, 'l1_norm'): + result = f.rep.l1_norm() + else: # pragma: no cover + raise OperationNotSupported(f, 'l1_norm') + + return f.rep.dom.to_sympy(result) + + def clear_denoms(self, convert=False): + """ + Clear denominators, but keep the ground domain. + + Examples + ======== + + >>> from sympy import Poly, S, QQ + >>> from sympy.abc import x + + >>> f = Poly(x/2 + S(1)/3, x, domain=QQ) + + >>> f.clear_denoms() + (6, Poly(3*x + 2, x, domain='QQ')) + >>> f.clear_denoms(convert=True) + (6, Poly(3*x + 2, x, domain='ZZ')) + + """ + f = self + + if not f.rep.dom.is_Field: + return S.One, f + + dom = f.get_domain() + if dom.has_assoc_Ring: + dom = f.rep.dom.get_ring() + + if hasattr(f.rep, 'clear_denoms'): + coeff, result = f.rep.clear_denoms() + else: # pragma: no cover + raise OperationNotSupported(f, 'clear_denoms') + + coeff, f = dom.to_sympy(coeff), f.per(result) + + if not convert or not dom.has_assoc_Ring: + return coeff, f + else: + return coeff, f.to_ring() + + def rat_clear_denoms(self, g): + """ + Clear denominators in a rational function ``f/g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = Poly(x**2/y + 1, x) + >>> g = Poly(x**3 + y, x) + + >>> p, q = f.rat_clear_denoms(g) + + >>> p + Poly(x**2 + y, x, domain='ZZ[y]') + >>> q + Poly(y*x**3 + y**2, x, domain='ZZ[y]') + + """ + f = self + + dom, per, f, g = f._unify(g) + + f = per(f) + g = per(g) + + if not (dom.is_Field and dom.has_assoc_Ring): + return f, g + + a, f = f.clear_denoms(convert=True) + b, g = g.clear_denoms(convert=True) + + f = f.mul_ground(b) + g = g.mul_ground(a) + + return f, g + + def integrate(self, *specs, **args): + """ + Computes indefinite integral of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 2*x + 1, x).integrate() + Poly(1/3*x**3 + x**2 + x, x, domain='QQ') + + >>> Poly(x*y**2 + x, x, y).integrate((0, 1), (1, 0)) + Poly(1/2*x**2*y**2 + 1/2*x**2, x, y, domain='QQ') + + """ + f = self + + if args.get('auto', True) and f.rep.dom.is_Ring: + f = f.to_field() + + if hasattr(f.rep, 'integrate'): + if not specs: + return f.per(f.rep.integrate(m=1)) + + rep = f.rep + + for spec in specs: + if isinstance(spec, tuple): + gen, m = spec + else: + gen, m = spec, 1 + + rep = rep.integrate(int(m), f._gen_to_level(gen)) + + return f.per(rep) + else: # pragma: no cover + raise OperationNotSupported(f, 'integrate') + + def diff(f, *specs, **kwargs): + """ + Computes partial derivative of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + 2*x + 1, x).diff() + Poly(2*x + 2, x, domain='ZZ') + + >>> Poly(x*y**2 + x, x, y).diff((0, 0), (1, 1)) + Poly(2*x*y, x, y, domain='ZZ') + + """ + if not kwargs.get('evaluate', True): + return Derivative(f, *specs, **kwargs) + + if hasattr(f.rep, 'diff'): + if not specs: + return f.per(f.rep.diff(m=1)) + + rep = f.rep + + for spec in specs: + if isinstance(spec, tuple): + gen, m = spec + else: + gen, m = spec, 1 + + rep = rep.diff(int(m), f._gen_to_level(gen)) + + return f.per(rep) + else: # pragma: no cover + raise OperationNotSupported(f, 'diff') + + _eval_derivative = diff + + def eval(self, x, a=None, auto=True): + """ + Evaluate ``f`` at ``a`` in the given variable. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> Poly(x**2 + 2*x + 3, x).eval(2) + 11 + + >>> Poly(2*x*y + 3*x + y + 2, x, y).eval(x, 2) + Poly(5*y + 8, y, domain='ZZ') + + >>> f = Poly(2*x*y + 3*x + y + 2*z, x, y, z) + + >>> f.eval({x: 2}) + Poly(5*y + 2*z + 6, y, z, domain='ZZ') + >>> f.eval({x: 2, y: 5}) + Poly(2*z + 31, z, domain='ZZ') + >>> f.eval({x: 2, y: 5, z: 7}) + 45 + + >>> f.eval((2, 5)) + Poly(2*z + 31, z, domain='ZZ') + >>> f(2, 5) + Poly(2*z + 31, z, domain='ZZ') + + """ + f = self + + if a is None: + if isinstance(x, dict): + mapping = x + + for gen, value in mapping.items(): + f = f.eval(gen, value) + + return f + elif isinstance(x, (tuple, list)): + values = x + + if len(values) > len(f.gens): + raise ValueError("too many values provided") + + for gen, value in zip(f.gens, values): + f = f.eval(gen, value) + + return f + else: + j, a = 0, x + else: + j = f._gen_to_level(x) + + if not hasattr(f.rep, 'eval'): # pragma: no cover + raise OperationNotSupported(f, 'eval') + + try: + result = f.rep.eval(a, j) + except CoercionFailed: + if not auto: + raise DomainError("Cannot evaluate at %s in %s" % (a, f.rep.dom)) + else: + a_domain, [a] = construct_domain([a]) + new_domain = f.get_domain().unify_with_symbols(a_domain, f.gens) + + f = f.set_domain(new_domain) + a = new_domain.convert(a, a_domain) + + result = f.rep.eval(a, j) + + return f.per(result, remove=j) + + def __call__(f, *values): + """ + Evaluate ``f`` at the give values. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y, z + + >>> f = Poly(2*x*y + 3*x + y + 2*z, x, y, z) + + >>> f(2) + Poly(5*y + 2*z + 6, y, z, domain='ZZ') + >>> f(2, 5) + Poly(2*z + 31, z, domain='ZZ') + >>> f(2, 5, 7) + 45 + + """ + return f.eval(values) + + def half_gcdex(f, g, auto=True): + """ + Half extended Euclidean algorithm of ``f`` and ``g``. + + Returns ``(s, h)`` such that ``h = gcd(f, g)`` and ``s*f = h (mod g)``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15 + >>> g = x**3 + x**2 - 4*x - 4 + + >>> Poly(f).half_gcdex(Poly(g)) + (Poly(-1/5*x + 3/5, x, domain='QQ'), Poly(x + 1, x, domain='QQ')) + + """ + dom, per, F, G = f._unify(g) + + if auto and dom.is_Ring: + F, G = F.to_field(), G.to_field() + + if hasattr(f.rep, 'half_gcdex'): + s, h = F.half_gcdex(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'half_gcdex') + + return per(s), per(h) + + def gcdex(f, g, auto=True): + """ + Extended Euclidean algorithm of ``f`` and ``g``. + + Returns ``(s, t, h)`` such that ``h = gcd(f, g)`` and ``s*f + t*g = h``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15 + >>> g = x**3 + x**2 - 4*x - 4 + + >>> Poly(f).gcdex(Poly(g)) + (Poly(-1/5*x + 3/5, x, domain='QQ'), + Poly(1/5*x**2 - 6/5*x + 2, x, domain='QQ'), + Poly(x + 1, x, domain='QQ')) + + """ + dom, per, F, G = f._unify(g) + + if auto and dom.is_Ring: + F, G = F.to_field(), G.to_field() + + if hasattr(f.rep, 'gcdex'): + s, t, h = F.gcdex(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'gcdex') + + return per(s), per(t), per(h) + + def invert(f, g, auto=True): + """ + Invert ``f`` modulo ``g`` when possible. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).invert(Poly(2*x - 1, x)) + Poly(-4/3, x, domain='QQ') + + >>> Poly(x**2 - 1, x).invert(Poly(x - 1, x)) + Traceback (most recent call last): + ... + NotInvertible: zero divisor + + """ + dom, per, F, G = f._unify(g) + + if auto and dom.is_Ring: + F, G = F.to_field(), G.to_field() + + if hasattr(f.rep, 'invert'): + result = F.invert(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'invert') + + return per(result) + + def revert(f, n): + """ + Compute ``f**(-1)`` mod ``x**n``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(1, x).revert(2) + Poly(1, x, domain='ZZ') + + >>> Poly(1 + x, x).revert(1) + Poly(1, x, domain='ZZ') + + >>> Poly(x**2 - 2, x).revert(2) + Traceback (most recent call last): + ... + NotReversible: only units are reversible in a ring + + >>> Poly(1/x, x).revert(1) + Traceback (most recent call last): + ... + PolynomialError: 1/x contains an element of the generators set + + """ + if hasattr(f.rep, 'revert'): + result = f.rep.revert(int(n)) + else: # pragma: no cover + raise OperationNotSupported(f, 'revert') + + return f.per(result) + + def subresultants(f, g): + """ + Computes the subresultant PRS of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 1, x).subresultants(Poly(x**2 - 1, x)) + [Poly(x**2 + 1, x, domain='ZZ'), + Poly(x**2 - 1, x, domain='ZZ'), + Poly(-2, x, domain='ZZ')] + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'subresultants'): + result = F.subresultants(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'subresultants') + + return list(map(per, result)) + + def resultant(f, g, includePRS=False): + """ + Computes the resultant of ``f`` and ``g`` via PRS. + + If includePRS=True, it includes the subresultant PRS in the result. + Because the PRS is used to calculate the resultant, this is more + efficient than calling :func:`subresultants` separately. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = Poly(x**2 + 1, x) + + >>> f.resultant(Poly(x**2 - 1, x)) + 4 + >>> f.resultant(Poly(x**2 - 1, x), includePRS=True) + (4, [Poly(x**2 + 1, x, domain='ZZ'), Poly(x**2 - 1, x, domain='ZZ'), + Poly(-2, x, domain='ZZ')]) + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'resultant'): + if includePRS: + result, R = F.resultant(G, includePRS=includePRS) + else: + result = F.resultant(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'resultant') + + if includePRS: + return (per(result, remove=0), list(map(per, R))) + return per(result, remove=0) + + def discriminant(f): + """ + Computes the discriminant of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + 2*x + 3, x).discriminant() + -8 + + """ + if hasattr(f.rep, 'discriminant'): + result = f.rep.discriminant() + else: # pragma: no cover + raise OperationNotSupported(f, 'discriminant') + + return f.per(result, remove=0) + + def dispersionset(f, g=None): + r"""Compute the *dispersion set* of two polynomials. + + For two polynomials `f(x)` and `g(x)` with `\deg f > 0` + and `\deg g > 0` the dispersion set `\operatorname{J}(f, g)` is defined as: + + .. math:: + \operatorname{J}(f, g) + & := \{a \in \mathbb{N}_0 | \gcd(f(x), g(x+a)) \neq 1\} \\ + & = \{a \in \mathbb{N}_0 | \deg \gcd(f(x), g(x+a)) \geq 1\} + + For a single polynomial one defines `\operatorname{J}(f) := \operatorname{J}(f, f)`. + + Examples + ======== + + >>> from sympy import poly + >>> from sympy.polys.dispersion import dispersion, dispersionset + >>> from sympy.abc import x + + Dispersion set and dispersion of a simple polynomial: + + >>> fp = poly((x - 3)*(x + 3), x) + >>> sorted(dispersionset(fp)) + [0, 6] + >>> dispersion(fp) + 6 + + Note that the definition of the dispersion is not symmetric: + + >>> fp = poly(x**4 - 3*x**2 + 1, x) + >>> gp = fp.shift(-3) + >>> sorted(dispersionset(fp, gp)) + [2, 3, 4] + >>> dispersion(fp, gp) + 4 + >>> sorted(dispersionset(gp, fp)) + [] + >>> dispersion(gp, fp) + -oo + + Computing the dispersion also works over field extensions: + + >>> from sympy import sqrt + >>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ') + >>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ') + >>> sorted(dispersionset(fp, gp)) + [2] + >>> sorted(dispersionset(gp, fp)) + [1, 4] + + We can even perform the computations for polynomials + having symbolic coefficients: + + >>> from sympy.abc import a + >>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x) + >>> sorted(dispersionset(fp)) + [0, 1] + + See Also + ======== + + dispersion + + References + ========== + + 1. [ManWright94]_ + 2. [Koepf98]_ + 3. [Abramov71]_ + 4. [Man93]_ + """ + from sympy.polys.dispersion import dispersionset + return dispersionset(f, g) + + def dispersion(f, g=None): + r"""Compute the *dispersion* of polynomials. + + For two polynomials `f(x)` and `g(x)` with `\deg f > 0` + and `\deg g > 0` the dispersion `\operatorname{dis}(f, g)` is defined as: + + .. math:: + \operatorname{dis}(f, g) + & := \max\{ J(f,g) \cup \{0\} \} \\ + & = \max\{ \{a \in \mathbb{N} | \gcd(f(x), g(x+a)) \neq 1\} \cup \{0\} \} + + and for a single polynomial `\operatorname{dis}(f) := \operatorname{dis}(f, f)`. + + Examples + ======== + + >>> from sympy import poly + >>> from sympy.polys.dispersion import dispersion, dispersionset + >>> from sympy.abc import x + + Dispersion set and dispersion of a simple polynomial: + + >>> fp = poly((x - 3)*(x + 3), x) + >>> sorted(dispersionset(fp)) + [0, 6] + >>> dispersion(fp) + 6 + + Note that the definition of the dispersion is not symmetric: + + >>> fp = poly(x**4 - 3*x**2 + 1, x) + >>> gp = fp.shift(-3) + >>> sorted(dispersionset(fp, gp)) + [2, 3, 4] + >>> dispersion(fp, gp) + 4 + >>> sorted(dispersionset(gp, fp)) + [] + >>> dispersion(gp, fp) + -oo + + Computing the dispersion also works over field extensions: + + >>> from sympy import sqrt + >>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ') + >>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ') + >>> sorted(dispersionset(fp, gp)) + [2] + >>> sorted(dispersionset(gp, fp)) + [1, 4] + + We can even perform the computations for polynomials + having symbolic coefficients: + + >>> from sympy.abc import a + >>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x) + >>> sorted(dispersionset(fp)) + [0, 1] + + See Also + ======== + + dispersionset + + References + ========== + + 1. [ManWright94]_ + 2. [Koepf98]_ + 3. [Abramov71]_ + 4. [Man93]_ + """ + from sympy.polys.dispersion import dispersion + return dispersion(f, g) + + def cofactors(f, g): + """ + Returns the GCD of ``f`` and ``g`` and their cofactors. + + Returns polynomials ``(h, cff, cfg)`` such that ``h = gcd(f, g)``, and + ``cff = quo(f, h)`` and ``cfg = quo(g, h)`` are, so called, cofactors + of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).cofactors(Poly(x**2 - 3*x + 2, x)) + (Poly(x - 1, x, domain='ZZ'), + Poly(x + 1, x, domain='ZZ'), + Poly(x - 2, x, domain='ZZ')) + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'cofactors'): + h, cff, cfg = F.cofactors(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'cofactors') + + return per(h), per(cff), per(cfg) + + def gcd(f, g): + """ + Returns the polynomial GCD of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).gcd(Poly(x**2 - 3*x + 2, x)) + Poly(x - 1, x, domain='ZZ') + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'gcd'): + result = F.gcd(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'gcd') + + return per(result) + + def lcm(f, g): + """ + Returns polynomial LCM of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 1, x).lcm(Poly(x**2 - 3*x + 2, x)) + Poly(x**3 - 2*x**2 - x + 2, x, domain='ZZ') + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'lcm'): + result = F.lcm(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'lcm') + + return per(result) + + def trunc(f, p): + """ + Reduce ``f`` modulo a constant ``p``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**3 + 3*x**2 + 5*x + 7, x).trunc(3) + Poly(-x**3 - x + 1, x, domain='ZZ') + + """ + p = f.rep.dom.convert(p) + + if hasattr(f.rep, 'trunc'): + result = f.rep.trunc(p) + else: # pragma: no cover + raise OperationNotSupported(f, 'trunc') + + return f.per(result) + + def monic(self, auto=True): + """ + Divides all coefficients by ``LC(f)``. + + Examples + ======== + + >>> from sympy import Poly, ZZ + >>> from sympy.abc import x + + >>> Poly(3*x**2 + 6*x + 9, x, domain=ZZ).monic() + Poly(x**2 + 2*x + 3, x, domain='QQ') + + >>> Poly(3*x**2 + 4*x + 2, x, domain=ZZ).monic() + Poly(x**2 + 4/3*x + 2/3, x, domain='QQ') + + """ + f = self + + if auto and f.rep.dom.is_Ring: + f = f.to_field() + + if hasattr(f.rep, 'monic'): + result = f.rep.monic() + else: # pragma: no cover + raise OperationNotSupported(f, 'monic') + + return f.per(result) + + def content(f): + """ + Returns the GCD of polynomial coefficients. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(6*x**2 + 8*x + 12, x).content() + 2 + + """ + if hasattr(f.rep, 'content'): + result = f.rep.content() + else: # pragma: no cover + raise OperationNotSupported(f, 'content') + + return f.rep.dom.to_sympy(result) + + def primitive(f): + """ + Returns the content and a primitive form of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**2 + 8*x + 12, x).primitive() + (2, Poly(x**2 + 4*x + 6, x, domain='ZZ')) + + """ + if hasattr(f.rep, 'primitive'): + cont, result = f.rep.primitive() + else: # pragma: no cover + raise OperationNotSupported(f, 'primitive') + + return f.rep.dom.to_sympy(cont), f.per(result) + + def compose(f, g): + """ + Computes the functional composition of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + x, x).compose(Poly(x - 1, x)) + Poly(x**2 - x, x, domain='ZZ') + + """ + _, per, F, G = f._unify(g) + + if hasattr(f.rep, 'compose'): + result = F.compose(G) + else: # pragma: no cover + raise OperationNotSupported(f, 'compose') + + return per(result) + + def decompose(f): + """ + Computes a functional decomposition of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**4 + 2*x**3 - x - 1, x, domain='ZZ').decompose() + [Poly(x**2 - x - 1, x, domain='ZZ'), Poly(x**2 + x, x, domain='ZZ')] + + """ + if hasattr(f.rep, 'decompose'): + result = f.rep.decompose() + else: # pragma: no cover + raise OperationNotSupported(f, 'decompose') + + return list(map(f.per, result)) + + def shift(f, a): + """ + Efficiently compute Taylor shift ``f(x + a)``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 2*x + 1, x).shift(2) + Poly(x**2 + 2*x + 1, x, domain='ZZ') + + See Also + ======== + + shift_list: Analogous method for multivariate polynomials. + """ + return f.per(f.rep.shift(a)) + + def shift_list(f, a): + """ + Efficiently compute Taylor shift ``f(X + A)``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x*y, [x,y]).shift_list([1, 2]) == Poly((x+1)*(y+2), [x,y]) + True + + See Also + ======== + + shift: Analogous method for univariate polynomials. + """ + return f.per(f.rep.shift_list(a)) + + def transform(f, p, q): + """ + Efficiently evaluate the functional transformation ``q**n * f(p/q)``. + + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 2*x + 1, x).transform(Poly(x + 1, x), Poly(x - 1, x)) + Poly(4, x, domain='ZZ') + + """ + P, Q = p.unify(q) + F, P = f.unify(P) + F, Q = F.unify(Q) + + if hasattr(F.rep, 'transform'): + result = F.rep.transform(P.rep, Q.rep) + else: # pragma: no cover + raise OperationNotSupported(F, 'transform') + + return F.per(result) + + def sturm(self, auto=True): + """ + Computes the Sturm sequence of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 - 2*x**2 + x - 3, x).sturm() + [Poly(x**3 - 2*x**2 + x - 3, x, domain='QQ'), + Poly(3*x**2 - 4*x + 1, x, domain='QQ'), + Poly(2/9*x + 25/9, x, domain='QQ'), + Poly(-2079/4, x, domain='QQ')] + + """ + f = self + + if auto and f.rep.dom.is_Ring: + f = f.to_field() + + if hasattr(f.rep, 'sturm'): + result = f.rep.sturm() + else: # pragma: no cover + raise OperationNotSupported(f, 'sturm') + + return list(map(f.per, result)) + + def gff_list(f): + """ + Computes greatest factorial factorization of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = x**5 + 2*x**4 - x**3 - 2*x**2 + + >>> Poly(f).gff_list() + [(Poly(x, x, domain='ZZ'), 1), (Poly(x + 2, x, domain='ZZ'), 4)] + + """ + if hasattr(f.rep, 'gff_list'): + result = f.rep.gff_list() + else: # pragma: no cover + raise OperationNotSupported(f, 'gff_list') + + return [(f.per(g), k) for g, k in result] + + def norm(f): + """ + Computes the product, ``Norm(f)``, of the conjugates of + a polynomial ``f`` defined over a number field ``K``. + + Examples + ======== + + >>> from sympy import Poly, sqrt + >>> from sympy.abc import x + + >>> a, b = sqrt(2), sqrt(3) + + A polynomial over a quadratic extension. + Two conjugates x - a and x + a. + + >>> f = Poly(x - a, x, extension=a) + >>> f.norm() + Poly(x**2 - 2, x, domain='QQ') + + A polynomial over a quartic extension. + Four conjugates x - a, x - a, x + a and x + a. + + >>> f = Poly(x - a, x, extension=(a, b)) + >>> f.norm() + Poly(x**4 - 4*x**2 + 4, x, domain='QQ') + + """ + if hasattr(f.rep, 'norm'): + r = f.rep.norm() + else: # pragma: no cover + raise OperationNotSupported(f, 'norm') + + return f.per(r) + + def sqf_norm(f): + """ + Computes square-free norm of ``f``. + + Returns ``s``, ``f``, ``r``, such that ``g(x) = f(x-sa)`` and + ``r(x) = Norm(g(x))`` is a square-free polynomial over ``K``, + where ``a`` is the algebraic extension of the ground domain. + + Examples + ======== + + >>> from sympy import Poly, sqrt + >>> from sympy.abc import x + + >>> s, f, r = Poly(x**2 + 1, x, extension=[sqrt(3)]).sqf_norm() + + >>> s + [1] + >>> f + Poly(x**2 - 2*sqrt(3)*x + 4, x, domain='QQ') + >>> r + Poly(x**4 - 4*x**2 + 16, x, domain='QQ') + + """ + if hasattr(f.rep, 'sqf_norm'): + s, g, r = f.rep.sqf_norm() + else: # pragma: no cover + raise OperationNotSupported(f, 'sqf_norm') + + return s, f.per(g), f.per(r) + + def sqf_part(f): + """ + Computes square-free part of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**3 - 3*x - 2, x).sqf_part() + Poly(x**2 - x - 2, x, domain='ZZ') + + """ + if hasattr(f.rep, 'sqf_part'): + result = f.rep.sqf_part() + else: # pragma: no cover + raise OperationNotSupported(f, 'sqf_part') + + return f.per(result) + + def sqf_list(f, all=False): + """ + Returns a list of square-free factors of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = 2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16 + + >>> Poly(f).sqf_list() + (2, [(Poly(x + 1, x, domain='ZZ'), 2), + (Poly(x + 2, x, domain='ZZ'), 3)]) + + >>> Poly(f).sqf_list(all=True) + (2, [(Poly(1, x, domain='ZZ'), 1), + (Poly(x + 1, x, domain='ZZ'), 2), + (Poly(x + 2, x, domain='ZZ'), 3)]) + + """ + if hasattr(f.rep, 'sqf_list'): + coeff, factors = f.rep.sqf_list(all) + else: # pragma: no cover + raise OperationNotSupported(f, 'sqf_list') + + return f.rep.dom.to_sympy(coeff), [(f.per(g), k) for g, k in factors] + + def sqf_list_include(f, all=False): + """ + Returns a list of square-free factors of ``f``. + + Examples + ======== + + >>> from sympy import Poly, expand + >>> from sympy.abc import x + + >>> f = expand(2*(x + 1)**3*x**4) + >>> f + 2*x**7 + 6*x**6 + 6*x**5 + 2*x**4 + + >>> Poly(f).sqf_list_include() + [(Poly(2, x, domain='ZZ'), 1), + (Poly(x + 1, x, domain='ZZ'), 3), + (Poly(x, x, domain='ZZ'), 4)] + + >>> Poly(f).sqf_list_include(all=True) + [(Poly(2, x, domain='ZZ'), 1), + (Poly(1, x, domain='ZZ'), 2), + (Poly(x + 1, x, domain='ZZ'), 3), + (Poly(x, x, domain='ZZ'), 4)] + + """ + if hasattr(f.rep, 'sqf_list_include'): + factors = f.rep.sqf_list_include(all) + else: # pragma: no cover + raise OperationNotSupported(f, 'sqf_list_include') + + return [(f.per(g), k) for g, k in factors] + + def factor_list(f) -> tuple[Expr, list[tuple[Poly, int]]]: + """ + Returns a list of irreducible factors of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = 2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y + + >>> Poly(f).factor_list() + (2, [(Poly(x + y, x, y, domain='ZZ'), 1), + (Poly(x**2 + 1, x, y, domain='ZZ'), 2)]) + + """ + if hasattr(f.rep, 'factor_list'): + try: + coeff, factors = f.rep.factor_list() + except DomainError: + if f.degree() == 0: + return f.as_expr(), [] + else: + return S.One, [(f, 1)] + else: # pragma: no cover + raise OperationNotSupported(f, 'factor_list') + + return f.rep.dom.to_sympy(coeff), [(f.per(g), k) for g, k in factors] + + def factor_list_include(f): + """ + Returns a list of irreducible factors of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> f = 2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y + + >>> Poly(f).factor_list_include() + [(Poly(2*x + 2*y, x, y, domain='ZZ'), 1), + (Poly(x**2 + 1, x, y, domain='ZZ'), 2)] + + """ + if hasattr(f.rep, 'factor_list_include'): + try: + factors = f.rep.factor_list_include() + except DomainError: + return [(f, 1)] + else: # pragma: no cover + raise OperationNotSupported(f, 'factor_list_include') + + return [(f.per(g), k) for g, k in factors] + + def intervals(f, all=False, eps=None, inf=None, sup=None, fast=False, sqf=False): + """ + Compute isolating intervals for roots of ``f``. + + For real roots the Vincent-Akritas-Strzebonski (VAS) continued fractions method is used. + + References + ========== + .. [#] Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative Study of Two Real Root + Isolation Methods . Nonlinear Analysis: Modelling and Control, Vol. 10, No. 4, 297-304, 2005. + .. [#] Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. Vigklas: Improving the + Performance of the Continued Fractions Method Using new Bounds of Positive Roots. Nonlinear + Analysis: Modelling and Control, Vol. 13, No. 3, 265-279, 2008. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 3, x).intervals() + [((-2, -1), 1), ((1, 2), 1)] + >>> Poly(x**2 - 3, x).intervals(eps=1e-2) + [((-26/15, -19/11), 1), ((19/11, 26/15), 1)] + + """ + if eps is not None: + eps = QQ.convert(eps) + + if eps <= 0: + raise ValueError("'eps' must be a positive rational") + + if inf is not None: + inf = QQ.convert(inf) + if sup is not None: + sup = QQ.convert(sup) + + if hasattr(f.rep, 'intervals'): + result = f.rep.intervals( + all=all, eps=eps, inf=inf, sup=sup, fast=fast, sqf=sqf) + else: # pragma: no cover + raise OperationNotSupported(f, 'intervals') + + if sqf: + def _real(interval): + s, t = interval + return (QQ.to_sympy(s), QQ.to_sympy(t)) + + if not all: + return list(map(_real, result)) + + def _complex(rectangle): + (u, v), (s, t) = rectangle + return (QQ.to_sympy(u) + I*QQ.to_sympy(v), + QQ.to_sympy(s) + I*QQ.to_sympy(t)) + + real_part, complex_part = result + + return list(map(_real, real_part)), list(map(_complex, complex_part)) + else: + def _real(interval): + (s, t), k = interval + return ((QQ.to_sympy(s), QQ.to_sympy(t)), k) + + if not all: + return list(map(_real, result)) + + def _complex(rectangle): + ((u, v), (s, t)), k = rectangle + return ((QQ.to_sympy(u) + I*QQ.to_sympy(v), + QQ.to_sympy(s) + I*QQ.to_sympy(t)), k) + + real_part, complex_part = result + + return list(map(_real, real_part)), list(map(_complex, complex_part)) + + def refine_root(f, s, t, eps=None, steps=None, fast=False, check_sqf=False): + """ + Refine an isolating interval of a root to the given precision. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 3, x).refine_root(1, 2, eps=1e-2) + (19/11, 26/15) + + """ + if check_sqf and not f.is_sqf: + raise PolynomialError("only square-free polynomials supported") + + s, t = QQ.convert(s), QQ.convert(t) + + if eps is not None: + eps = QQ.convert(eps) + + if eps <= 0: + raise ValueError("'eps' must be a positive rational") + + if steps is not None: + steps = int(steps) + elif eps is None: + steps = 1 + + if hasattr(f.rep, 'refine_root'): + S, T = f.rep.refine_root(s, t, eps=eps, steps=steps, fast=fast) + else: # pragma: no cover + raise OperationNotSupported(f, 'refine_root') + + return QQ.to_sympy(S), QQ.to_sympy(T) + + def count_roots(f, inf=None, sup=None): + """ + Return the number of roots of ``f`` in ``[inf, sup]`` interval. + + Examples + ======== + + >>> from sympy import Poly, I + >>> from sympy.abc import x + + >>> Poly(x**4 - 4, x).count_roots(-3, 3) + 2 + >>> Poly(x**4 - 4, x).count_roots(0, 1 + 3*I) + 1 + + """ + inf_real, sup_real = True, True + + if inf is not None: + inf = sympify(inf) + + if inf is S.NegativeInfinity: + inf = None + else: + re, im = inf.as_real_imag() + + if not im: + inf = QQ.convert(inf) + else: + inf, inf_real = list(map(QQ.convert, (re, im))), False + + if sup is not None: + sup = sympify(sup) + + if sup is S.Infinity: + sup = None + else: + re, im = sup.as_real_imag() + + if not im: + sup = QQ.convert(sup) + else: + sup, sup_real = list(map(QQ.convert, (re, im))), False + + if inf_real and sup_real: + if hasattr(f.rep, 'count_real_roots'): + count = f.rep.count_real_roots(inf=inf, sup=sup) + else: # pragma: no cover + raise OperationNotSupported(f, 'count_real_roots') + else: + if inf_real and inf is not None: + inf = (inf, QQ.zero) + + if sup_real and sup is not None: + sup = (sup, QQ.zero) + + if hasattr(f.rep, 'count_complex_roots'): + count = f.rep.count_complex_roots(inf=inf, sup=sup) + else: # pragma: no cover + raise OperationNotSupported(f, 'count_complex_roots') + + return Integer(count) + + def root(f, index, radicals=True): + """ + Get an indexed root of a polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = Poly(2*x**3 - 7*x**2 + 4*x + 4) + + >>> f.root(0) + -1/2 + >>> f.root(1) + 2 + >>> f.root(2) + 2 + >>> f.root(3) + Traceback (most recent call last): + ... + IndexError: root index out of [-3, 2] range, got 3 + + >>> Poly(x**5 + x + 1).root(0) + CRootOf(x**3 - x**2 + 1, 0) + + """ + return sympy.polys.rootoftools.rootof(f, index, radicals=radicals) + + def real_roots(f, multiple=True, radicals=True): + """ + Return a list of real roots with multiplicities. + + See :func:`real_roots` for more explanation. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**3 - 7*x**2 + 4*x + 4).real_roots() + [-1/2, 2, 2] + >>> Poly(x**3 + x + 1).real_roots() + [CRootOf(x**3 + x + 1, 0)] + """ + reals = sympy.polys.rootoftools.CRootOf.real_roots(f, radicals=radicals) + + if multiple: + return reals + else: + return group(reals, multiple=False) + + def all_roots(f, multiple=True, radicals=True): + """ + Return a list of real and complex roots with multiplicities. + + See :func:`all_roots` for more explanation. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**3 - 7*x**2 + 4*x + 4).all_roots() + [-1/2, 2, 2] + >>> Poly(x**3 + x + 1).all_roots() + [CRootOf(x**3 + x + 1, 0), + CRootOf(x**3 + x + 1, 1), + CRootOf(x**3 + x + 1, 2)] + + """ + roots = sympy.polys.rootoftools.CRootOf.all_roots(f, radicals=radicals) + + if multiple: + return roots + else: + return group(roots, multiple=False) + + def nroots(f, n=15, maxsteps=50, cleanup=True): + """ + Compute numerical approximations of roots of ``f``. + + Parameters + ========== + + n ... the number of digits to calculate + maxsteps ... the maximum number of iterations to do + + If the accuracy `n` cannot be reached in `maxsteps`, it will raise an + exception. You need to rerun with higher maxsteps. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 3).nroots(n=15) + [-1.73205080756888, 1.73205080756888] + >>> Poly(x**2 - 3).nroots(n=30) + [-1.73205080756887729352744634151, 1.73205080756887729352744634151] + + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "Cannot compute numerical roots of %s" % f) + + if f.degree() <= 0: + return [] + + # For integer and rational coefficients, convert them to integers only + # (for accuracy). Otherwise just try to convert the coefficients to + # mpmath.mpc and raise an exception if the conversion fails. + if f.rep.dom is ZZ: + coeffs = [int(coeff) for coeff in f.all_coeffs()] + elif f.rep.dom is QQ: + denoms = [coeff.q for coeff in f.all_coeffs()] + fac = ilcm(*denoms) + coeffs = [int(coeff*fac) for coeff in f.all_coeffs()] + else: + coeffs = [coeff.evalf(n=n).as_real_imag() + for coeff in f.all_coeffs()] + with mpmath.workdps(n): + try: + coeffs = [mpmath.mpc(*coeff) for coeff in coeffs] + except TypeError: + raise DomainError("Numerical domain expected, got %s" % \ + f.rep.dom) + + dps = mpmath.mp.dps + mpmath.mp.dps = n + + from sympy.functions.elementary.complexes import sign + try: + # We need to add extra precision to guard against losing accuracy. + # 10 times the degree of the polynomial seems to work well. + roots = mpmath.polyroots(coeffs, maxsteps=maxsteps, + cleanup=cleanup, error=False, extraprec=f.degree()*10) + + # Mpmath puts real roots first, then complex ones (as does all_roots) + # so we make sure this convention holds here, too. + roots = list(map(sympify, + sorted(roots, key=lambda r: (1 if r.imag else 0, r.real, abs(r.imag), sign(r.imag))))) + except NoConvergence: + try: + # If roots did not converge try again with more extra precision. + roots = mpmath.polyroots(coeffs, maxsteps=maxsteps, + cleanup=cleanup, error=False, extraprec=f.degree()*15) + roots = list(map(sympify, + sorted(roots, key=lambda r: (1 if r.imag else 0, r.real, abs(r.imag), sign(r.imag))))) + except NoConvergence: + raise NoConvergence( + 'convergence to root failed; try n < %s or maxsteps > %s' % ( + n, maxsteps)) + finally: + mpmath.mp.dps = dps + + return roots + + def ground_roots(f): + """ + Compute roots of ``f`` by factorization in the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**6 - 4*x**4 + 4*x**3 - x**2).ground_roots() + {0: 2, 1: 2} + + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "Cannot compute ground roots of %s" % f) + + roots = {} + + for factor, k in f.factor_list()[1]: + if factor.is_linear: + a, b = factor.all_coeffs() + roots[-b/a] = k + + return roots + + def nth_power_roots_poly(f, n): + """ + Construct a polynomial with n-th powers of roots of ``f``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = Poly(x**4 - x**2 + 1) + + >>> f.nth_power_roots_poly(2) + Poly(x**4 - 2*x**3 + 3*x**2 - 2*x + 1, x, domain='ZZ') + >>> f.nth_power_roots_poly(3) + Poly(x**4 + 2*x**2 + 1, x, domain='ZZ') + >>> f.nth_power_roots_poly(4) + Poly(x**4 + 2*x**3 + 3*x**2 + 2*x + 1, x, domain='ZZ') + >>> f.nth_power_roots_poly(12) + Poly(x**4 - 4*x**3 + 6*x**2 - 4*x + 1, x, domain='ZZ') + + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "must be a univariate polynomial") + + N = sympify(n) + + if N.is_Integer and N >= 1: + n = int(N) + else: + raise ValueError("'n' must an integer and n >= 1, got %s" % n) + + x = f.gen + t = Dummy('t') + + r = f.resultant(f.__class__.from_expr(x**n - t, x, t)) + + return r.replace(t, x) + + def which_real_roots(f, candidates): + """ + Find roots of a square-free polynomial ``f`` from ``candidates``. + + Explanation + =========== + + If ``f`` is a square-free polynomial and ``candidates`` is a superset + of the roots of ``f``, then ``f.which_real_roots(candidates)`` returns a + list containing exactly the set of roots of ``f``. The domain must be + :ref:`ZZ`, :ref:`QQ`, or :ref:`QQ(a)` and``f`` must be univariate and + square-free. + + The list ``candidates`` must be a superset of the real roots of ``f`` + and ``f.which_real_roots(candidates)`` returns the set of real roots + of ``f``. The output preserves the order of the order of ``candidates``. + + Examples + ======== + + >>> from sympy import Poly, sqrt + >>> from sympy.abc import x + + >>> f = Poly(x**4 - 1) + >>> f.which_real_roots([-1, 1, 0, -2, 2]) + [-1, 1] + >>> f.which_real_roots([-1, 1, 1, 1, 1]) + [-1, 1] + + This method is useful as lifting to rational coefficients + produced extraneous roots, which we can filter out with + this method. + + >>> f = Poly(sqrt(2)*x**3 + x**2 - 1, x, extension=True) + >>> f.lift() + Poly(-2*x**6 + x**4 - 2*x**2 + 1, x, domain='QQ') + >>> f.lift().real_roots() + [-sqrt(2)/2, sqrt(2)/2] + >>> f.which_real_roots(f.lift().real_roots()) + [sqrt(2)/2] + + This procedure is already done internally when calling + `.real_roots()` on a polynomial with algebraic coefficients. + + >>> f.real_roots() + [sqrt(2)/2] + + See Also + ======== + + same_root + which_all_roots + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "Must be a univariate polynomial") + + dom = f.get_domain() + + if not (dom.is_ZZ or dom.is_QQ or dom.is_AlgebraicField): + raise NotImplementedError( + "root counting not supported over %s" % dom) + + return f._which_roots(candidates, f.count_roots()) + + def which_all_roots(f, candidates): + """ + Find roots of a square-free polynomial ``f`` from ``candidates``. + + Explanation + =========== + + If ``f`` is a square-free polynomial and ``candidates`` is a superset + of the roots of ``f``, then ``f.which_all_roots(candidates)`` returns a + list containing exactly the set of roots of ``f``. The polynomial``f`` + must be univariate and square-free. + + The list ``candidates`` must be a superset of the complex roots of + ``f`` and ``f.which_all_roots(candidates)`` returns exactly the + set of all complex roots of ``f``. The output preserves the order of + the order of ``candidates``. + + Examples + ======== + + >>> from sympy import Poly, I + >>> from sympy.abc import x + + >>> f = Poly(x**4 - 1) + >>> f.which_all_roots([-1, 1, -I, I, 0]) + [-1, 1, -I, I] + >>> f.which_all_roots([-1, 1, -I, I, I, I]) + [-1, 1, -I, I] + + This method is useful as lifting to rational coefficients + produced extraneous roots, which we can filter out with + this method. + + >>> f = Poly(x**2 + I*x - 1, x, extension=True) + >>> f.lift() + Poly(x**4 - x**2 + 1, x, domain='ZZ') + >>> f.lift().all_roots() + [CRootOf(x**4 - x**2 + 1, 0), + CRootOf(x**4 - x**2 + 1, 1), + CRootOf(x**4 - x**2 + 1, 2), + CRootOf(x**4 - x**2 + 1, 3)] + >>> f.which_all_roots(f.lift().all_roots()) + [CRootOf(x**4 - x**2 + 1, 0), CRootOf(x**4 - x**2 + 1, 2)] + + This procedure is already done internally when calling + `.all_roots()` on a polynomial with algebraic coefficients, + or polynomials with Gaussian domains. + + >>> f.all_roots() + [CRootOf(x**4 - x**2 + 1, 0), CRootOf(x**4 - x**2 + 1, 2)] + + See Also + ======== + + same_root + which_real_roots + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "Must be a univariate polynomial") + + return f._which_roots(candidates, f.degree()) + + def _which_roots(f, candidates, num_roots): + prec = 10 + # using Counter bc its like an ordered set + root_counts = Counter(candidates) + + while len(root_counts) > num_roots: + for r in list(root_counts.keys()): + # If f(r) != 0 then f(r).evalf() gives a float/complex with precision. + f_r = f(r).evalf(prec, maxn=2*prec) + if abs(f_r)._prec >= 2: + root_counts.pop(r) + + prec *= 2 + + return list(root_counts.keys()) + + def same_root(f, a, b): + """ + Decide whether two roots of this polynomial are equal. + + Examples + ======== + + >>> from sympy import Poly, cyclotomic_poly, exp, I, pi + >>> f = Poly(cyclotomic_poly(5)) + >>> r0 = exp(2*I*pi/5) + >>> indices = [i for i, r in enumerate(f.all_roots()) if f.same_root(r, r0)] + >>> print(indices) + [3] + + Raises + ====== + + DomainError + If the domain of the polynomial is not :ref:`ZZ`, :ref:`QQ`, + :ref:`RR`, or :ref:`CC`. + MultivariatePolynomialError + If the polynomial is not univariate. + PolynomialError + If the polynomial is of degree < 2. + + See Also + ======== + + which_real_roots + which_all_roots + """ + if f.is_multivariate: + raise MultivariatePolynomialError( + "Must be a univariate polynomial") + + dom_delta_sq = f.rep.mignotte_sep_bound_squared() + delta_sq = f.domain.get_field().to_sympy(dom_delta_sq) + # We have delta_sq = delta**2, where delta is a lower bound on the + # minimum separation between any two roots of this polynomial. + # Let eps = delta/3, and define eps_sq = eps**2 = delta**2/9. + eps_sq = delta_sq / 9 + + r, _, _, _ = evalf(1/eps_sq, 1, {}) + n = fastlog(r) + # Then 2^n > 1/eps**2. + m = (n // 2) + (n % 2) + # Then 2^(-m) < eps. + ev = lambda x: quad_to_mpmath(_evalf_with_bounded_error(x, m=m)) + + # Then for any complex numbers a, b we will have + # |a - ev(a)| < eps and |b - ev(b)| < eps. + # So if |ev(a) - ev(b)|**2 < eps**2, then + # |ev(a) - ev(b)| < eps, hence |a - b| < 3*eps = delta. + A, B = ev(a), ev(b) + return (A.real - B.real)**2 + (A.imag - B.imag)**2 < eps_sq + + def cancel(f, g, include=False): + """ + Cancel common factors in a rational function ``f/g``. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**2 - 2, x).cancel(Poly(x**2 - 2*x + 1, x)) + (1, Poly(2*x + 2, x, domain='ZZ'), Poly(x - 1, x, domain='ZZ')) + + >>> Poly(2*x**2 - 2, x).cancel(Poly(x**2 - 2*x + 1, x), include=True) + (Poly(2*x + 2, x, domain='ZZ'), Poly(x - 1, x, domain='ZZ')) + + """ + dom, per, F, G = f._unify(g) + + if hasattr(F, 'cancel'): + result = F.cancel(G, include=include) + else: # pragma: no cover + raise OperationNotSupported(f, 'cancel') + + if not include: + if dom.has_assoc_Ring: + dom = dom.get_ring() + + cp, cq, p, q = result + + cp = dom.to_sympy(cp) + cq = dom.to_sympy(cq) + + return cp/cq, per(p), per(q) + else: + return tuple(map(per, result)) + + def make_monic_over_integers_by_scaling_roots(f): + """ + Turn any univariate polynomial over :ref:`QQ` or :ref:`ZZ` into a monic + polynomial over :ref:`ZZ`, by scaling the roots as necessary. + + Explanation + =========== + + This operation can be performed whether or not *f* is irreducible; when + it is, this can be understood as determining an algebraic integer + generating the same field as a root of *f*. + + Examples + ======== + + >>> from sympy import Poly, S + >>> from sympy.abc import x + >>> f = Poly(x**2/2 + S(1)/4 * x + S(1)/8, x, domain='QQ') + >>> f.make_monic_over_integers_by_scaling_roots() + (Poly(x**2 + 2*x + 4, x, domain='ZZ'), 4) + + Returns + ======= + + Pair ``(g, c)`` + g is the polynomial + + c is the integer by which the roots had to be scaled + + """ + if not f.is_univariate or f.domain not in [ZZ, QQ]: + raise ValueError('Polynomial must be univariate over ZZ or QQ.') + if f.is_monic and f.domain == ZZ: + return f, ZZ.one + else: + fm = f.monic() + c, _ = fm.clear_denoms() + return fm.transform(Poly(fm.gen), c).to_ring(), c + + def galois_group(f, by_name=False, max_tries=30, randomize=False): + """ + Compute the Galois group of this polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + >>> f = Poly(x**4 - 2) + >>> G, _ = f.galois_group(by_name=True) + >>> print(G) + S4TransitiveSubgroups.D4 + + See Also + ======== + + sympy.polys.numberfields.galoisgroups.galois_group + + """ + from sympy.polys.numberfields.galoisgroups import ( + _galois_group_degree_3, _galois_group_degree_4_lookup, + _galois_group_degree_5_lookup_ext_factor, + _galois_group_degree_6_lookup, + ) + if (not f.is_univariate + or not f.is_irreducible + or f.domain not in [ZZ, QQ] + ): + raise ValueError('Polynomial must be irreducible and univariate over ZZ or QQ.') + gg = { + 3: _galois_group_degree_3, + 4: _galois_group_degree_4_lookup, + 5: _galois_group_degree_5_lookup_ext_factor, + 6: _galois_group_degree_6_lookup, + } + max_supported = max(gg.keys()) + n = f.degree() + if n > max_supported: + raise ValueError(f"Only polynomials up to degree {max_supported} are supported.") + elif n < 1: + raise ValueError("Constant polynomial has no Galois group.") + elif n == 1: + from sympy.combinatorics.galois import S1TransitiveSubgroups + name, alt = S1TransitiveSubgroups.S1, True + elif n == 2: + from sympy.combinatorics.galois import S2TransitiveSubgroups + name, alt = S2TransitiveSubgroups.S2, False + else: + g, _ = f.make_monic_over_integers_by_scaling_roots() + name, alt = gg[n](g, max_tries=max_tries, randomize=randomize) + G = name if by_name else name.get_perm_group() + return G, alt + + @property + def is_zero(f): + """ + Returns ``True`` if ``f`` is a zero polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(0, x).is_zero + True + >>> Poly(1, x).is_zero + False + + """ + return f.rep.is_zero + + @property + def is_one(f): + """ + Returns ``True`` if ``f`` is a unit polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(0, x).is_one + False + >>> Poly(1, x).is_one + True + + """ + return f.rep.is_one + + @property + def is_sqf(f): + """ + Returns ``True`` if ``f`` is a square-free polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 - 2*x + 1, x).is_sqf + False + >>> Poly(x**2 - 1, x).is_sqf + True + + """ + return f.rep.is_sqf + + @property + def is_monic(f): + """ + Returns ``True`` if the leading coefficient of ``f`` is one. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x + 2, x).is_monic + True + >>> Poly(2*x + 2, x).is_monic + False + + """ + return f.rep.is_monic + + @property + def is_primitive(f): + """ + Returns ``True`` if GCD of the coefficients of ``f`` is one. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(2*x**2 + 6*x + 12, x).is_primitive + False + >>> Poly(x**2 + 3*x + 6, x).is_primitive + True + + """ + return f.rep.is_primitive + + @property + def is_ground(f): + """ + Returns ``True`` if ``f`` is an element of the ground domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x, x).is_ground + False + >>> Poly(2, x).is_ground + True + >>> Poly(y, x).is_ground + True + + """ + return f.rep.is_ground + + @property + def is_linear(f): + """ + Returns ``True`` if ``f`` is linear in all its variables. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x + y + 2, x, y).is_linear + True + >>> Poly(x*y + 2, x, y).is_linear + False + + """ + return f.rep.is_linear + + @property + def is_quadratic(f): + """ + Returns ``True`` if ``f`` is quadratic in all its variables. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x*y + 2, x, y).is_quadratic + True + >>> Poly(x*y**2 + 2, x, y).is_quadratic + False + + """ + return f.rep.is_quadratic + + @property + def is_monomial(f): + """ + Returns ``True`` if ``f`` is zero or has only one term. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(3*x**2, x).is_monomial + True + >>> Poly(3*x**2 + 1, x).is_monomial + False + + """ + return f.rep.is_monomial + + @property + def is_homogeneous(f): + """ + Returns ``True`` if ``f`` is a homogeneous polynomial. + + A homogeneous polynomial is a polynomial whose all monomials with + non-zero coefficients have the same total degree. If you want not + only to check if a polynomial is homogeneous but also compute its + homogeneous order, then use :func:`Poly.homogeneous_order`. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + x*y, x, y).is_homogeneous + True + >>> Poly(x**3 + x*y, x, y).is_homogeneous + False + + """ + return f.rep.is_homogeneous + + @property + def is_irreducible(f): + """ + Returns ``True`` if ``f`` has no factors over its domain. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> Poly(x**2 + x + 1, x, modulus=2).is_irreducible + True + >>> Poly(x**2 + 1, x, modulus=2).is_irreducible + False + + """ + return f.rep.is_irreducible + + @property + def is_univariate(f): + """ + Returns ``True`` if ``f`` is a univariate polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + x + 1, x).is_univariate + True + >>> Poly(x*y**2 + x*y + 1, x, y).is_univariate + False + >>> Poly(x*y**2 + x*y + 1, x).is_univariate + True + >>> Poly(x**2 + x + 1, x, y).is_univariate + False + + """ + return len(f.gens) == 1 + + @property + def is_multivariate(f): + """ + Returns ``True`` if ``f`` is a multivariate polynomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x, y + + >>> Poly(x**2 + x + 1, x).is_multivariate + False + >>> Poly(x*y**2 + x*y + 1, x, y).is_multivariate + True + >>> Poly(x*y**2 + x*y + 1, x).is_multivariate + False + >>> Poly(x**2 + x + 1, x, y).is_multivariate + True + + """ + return len(f.gens) != 1 + + @property + def is_cyclotomic(f): + """ + Returns ``True`` if ``f`` is a cyclotomic polnomial. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.abc import x + + >>> f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1 + + >>> Poly(f).is_cyclotomic + False + + >>> g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1 + + >>> Poly(g).is_cyclotomic + True + + """ + return f.rep.is_cyclotomic + + def __abs__(f): + return f.abs() + + def __neg__(f): + return f.neg() + + @_polifyit + def __add__(f, g): + return f.add(g) + + @_polifyit + def __radd__(f, g): + return g.add(f) + + @_polifyit + def __sub__(f, g): + return f.sub(g) + + @_polifyit + def __rsub__(f, g): + return g.sub(f) + + @_polifyit + def __mul__(f, g): + return f.mul(g) + + @_polifyit + def __rmul__(f, g): + return g.mul(f) + + @_sympifyit('n', NotImplemented) + def __pow__(f, n): + if n.is_Integer and n >= 0: + return f.pow(n) + else: + return NotImplemented + + @_polifyit + def __divmod__(f, g): + return f.div(g) + + @_polifyit + def __rdivmod__(f, g): + return g.div(f) + + @_polifyit + def __mod__(f, g): + return f.rem(g) + + @_polifyit + def __rmod__(f, g): + return g.rem(f) + + @_polifyit + def __floordiv__(f, g): + return f.quo(g) + + @_polifyit + def __rfloordiv__(f, g): + return g.quo(f) + + @_sympifyit('g', NotImplemented) + def __truediv__(f, g): + return f.as_expr()/g.as_expr() + + @_sympifyit('g', NotImplemented) + def __rtruediv__(f, g): + return g.as_expr()/f.as_expr() + + @_sympifyit('other', NotImplemented) + def __eq__(self, other): + f, g = self, other + + if not g.is_Poly: + try: + g = f.__class__(g, f.gens, domain=f.get_domain()) + except (PolynomialError, DomainError, CoercionFailed): + return False + + if f.gens != g.gens: + return False + + if f.rep.dom != g.rep.dom: + return False + + return f.rep == g.rep + + @_sympifyit('g', NotImplemented) + def __ne__(f, g): + return not f == g + + def __bool__(f): + return not f.is_zero + + def eq(f, g, strict=False): + if not strict: + return f == g + else: + return f._strict_eq(sympify(g)) + + def ne(f, g, strict=False): + return not f.eq(g, strict=strict) + + def _strict_eq(f, g): + return isinstance(g, f.__class__) and f.gens == g.gens and f.rep.eq(g.rep, strict=True) + + +@public +class PurePoly(Poly): + """Class for representing pure polynomials. """ + + def _hashable_content(self): + """Allow SymPy to hash Poly instances. """ + return (self.rep,) + + def __hash__(self): + return super().__hash__() + + @property + def free_symbols(self): + """ + Free symbols of a polynomial. + + Examples + ======== + + >>> from sympy import PurePoly + >>> from sympy.abc import x, y + + >>> PurePoly(x**2 + 1).free_symbols + set() + >>> PurePoly(x**2 + y).free_symbols + set() + >>> PurePoly(x**2 + y, x).free_symbols + {y} + + """ + return self.free_symbols_in_domain + + @_sympifyit('other', NotImplemented) + def __eq__(self, other): + f, g = self, other + + if not g.is_Poly: + try: + g = f.__class__(g, f.gens, domain=f.get_domain()) + except (PolynomialError, DomainError, CoercionFailed): + return False + + if len(f.gens) != len(g.gens): + return False + + if f.rep.dom != g.rep.dom: + try: + dom = f.rep.dom.unify(g.rep.dom, f.gens) + except UnificationFailed: + return False + + f = f.set_domain(dom) + g = g.set_domain(dom) + + return f.rep == g.rep + + def _strict_eq(f, g): + return isinstance(g, f.__class__) and f.rep.eq(g.rep, strict=True) + + def _unify(f, g): + g = sympify(g) + + if not g.is_Poly: + try: + return f.rep.dom, f.per, f.rep, f.rep.per(f.rep.dom.from_sympy(g)) + except CoercionFailed: + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if len(f.gens) != len(g.gens): + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + if not (isinstance(f.rep, DMP) and isinstance(g.rep, DMP)): + raise UnificationFailed("Cannot unify %s with %s" % (f, g)) + + cls = f.__class__ + gens = f.gens + + dom = f.rep.dom.unify(g.rep.dom, gens) + + F = f.rep.convert(dom) + G = g.rep.convert(dom) + + def per(rep, dom=dom, gens=gens, remove=None): + if remove is not None: + gens = gens[:remove] + gens[remove + 1:] + + if not gens: + return dom.to_sympy(rep) + + return cls.new(rep, *gens) + + return dom, per, F, G + + +@public +def poly_from_expr(expr, *gens, **args): + """Construct a polynomial from an expression. """ + opt = options.build_options(gens, args) + return _poly_from_expr(expr, opt) + + +def _poly_from_expr(expr, opt): + """Construct a polynomial from an expression. """ + orig, expr = expr, sympify(expr) + + if not isinstance(expr, Basic): + raise PolificationFailed(opt, orig, expr) + elif expr.is_Poly: + poly = expr.__class__._from_poly(expr, opt) + + opt.gens = poly.gens + opt.domain = poly.domain + + if opt.polys is None: + opt.polys = True + + return poly, opt + elif opt.expand: + expr = expr.expand() + + rep, opt = _dict_from_expr(expr, opt) + if not opt.gens: + raise PolificationFailed(opt, orig, expr) + + monoms, coeffs = list(zip(*list(rep.items()))) + domain = opt.domain + + if domain is None: + opt.domain, coeffs = construct_domain(coeffs, opt=opt) + else: + coeffs = list(map(domain.from_sympy, coeffs)) + + rep = dict(list(zip(monoms, coeffs))) + poly = Poly._from_dict(rep, opt) + + if opt.polys is None: + opt.polys = False + + return poly, opt + + +@public +def parallel_poly_from_expr(exprs, *gens, **args): + """Construct polynomials from expressions. """ + opt = options.build_options(gens, args) + return _parallel_poly_from_expr(exprs, opt) + + +def _parallel_poly_from_expr(exprs, opt): + """Construct polynomials from expressions. """ + if len(exprs) == 2: + f, g = exprs + + if isinstance(f, Poly) and isinstance(g, Poly): + f = f.__class__._from_poly(f, opt) + g = g.__class__._from_poly(g, opt) + + f, g = f.unify(g) + + opt.gens = f.gens + opt.domain = f.domain + + if opt.polys is None: + opt.polys = True + + return [f, g], opt + + origs, exprs = list(exprs), [] + _exprs, _polys = [], [] + + failed = False + + for i, expr in enumerate(origs): + expr = sympify(expr) + + if isinstance(expr, Basic): + if expr.is_Poly: + _polys.append(i) + else: + _exprs.append(i) + + if opt.expand: + expr = expr.expand() + else: + failed = True + + exprs.append(expr) + + if failed: + raise PolificationFailed(opt, origs, exprs, True) + + if _polys: + # XXX: this is a temporary solution + for i in _polys: + exprs[i] = exprs[i].as_expr() + + reps, opt = _parallel_dict_from_expr(exprs, opt) + if not opt.gens: + raise PolificationFailed(opt, origs, exprs, True) + + from sympy.functions.elementary.piecewise import Piecewise + for k in opt.gens: + if isinstance(k, Piecewise): + raise PolynomialError("Piecewise generators do not make sense") + + coeffs_list, lengths = [], [] + + all_monoms = [] + all_coeffs = [] + + for rep in reps: + monoms, coeffs = list(zip(*list(rep.items()))) + + coeffs_list.extend(coeffs) + all_monoms.append(monoms) + + lengths.append(len(coeffs)) + + domain = opt.domain + + if domain is None: + opt.domain, coeffs_list = construct_domain(coeffs_list, opt=opt) + else: + coeffs_list = list(map(domain.from_sympy, coeffs_list)) + + for k in lengths: + all_coeffs.append(coeffs_list[:k]) + coeffs_list = coeffs_list[k:] + + polys = [] + + for monoms, coeffs in zip(all_monoms, all_coeffs): + rep = dict(list(zip(monoms, coeffs))) + poly = Poly._from_dict(rep, opt) + polys.append(poly) + + if opt.polys is None: + opt.polys = bool(_polys) + + return polys, opt + + +def _update_args(args, key, value): + """Add a new ``(key, value)`` pair to arguments ``dict``. """ + args = dict(args) + + if key not in args: + args[key] = value + + return args + + +@public +def degree(f, gen=0): + """ + Return the degree of ``f`` in the given variable. + + The degree of 0 is negative infinity. + + Examples + ======== + + >>> from sympy import degree + >>> from sympy.abc import x, y + + >>> degree(x**2 + y*x + 1, gen=x) + 2 + >>> degree(x**2 + y*x + 1, gen=y) + 1 + >>> degree(0, x) + -oo + + See also + ======== + + sympy.polys.polytools.Poly.total_degree + degree_list + """ + + f = sympify(f, strict=True) + gen_is_Num = sympify(gen, strict=True).is_Number + if f.is_Poly: + p = f + isNum = p.as_expr().is_Number + else: + isNum = f.is_Number + if not isNum: + if gen_is_Num: + p, _ = poly_from_expr(f) + else: + p, _ = poly_from_expr(f, gen) + + if isNum: + return S.Zero if f else S.NegativeInfinity + + if not gen_is_Num: + if f.is_Poly and gen not in p.gens: + # try recast without explicit gens + p, _ = poly_from_expr(f.as_expr()) + if gen not in p.gens: + return S.Zero + elif not f.is_Poly and len(f.free_symbols) > 1: + raise TypeError(filldedent(''' + A symbolic generator of interest is required for a multivariate + expression like func = %s, e.g. degree(func, gen = %s) instead of + degree(func, gen = %s). + ''' % (f, next(ordered(f.free_symbols)), gen))) + result = p.degree(gen) + return Integer(result) if isinstance(result, int) else S.NegativeInfinity + + +@public +def total_degree(f, *gens): + """ + Return the total_degree of ``f`` in the given variables. + + Examples + ======== + >>> from sympy import total_degree, Poly + >>> from sympy.abc import x, y + + >>> total_degree(1) + 0 + >>> total_degree(x + x*y) + 2 + >>> total_degree(x + x*y, x) + 1 + + If the expression is a Poly and no variables are given + then the generators of the Poly will be used: + + >>> p = Poly(x + x*y, y) + >>> total_degree(p) + 1 + + To deal with the underlying expression of the Poly, convert + it to an Expr: + + >>> total_degree(p.as_expr()) + 2 + + This is done automatically if any variables are given: + + >>> total_degree(p, x) + 1 + + See also + ======== + degree + """ + + p = sympify(f) + if p.is_Poly: + p = p.as_expr() + if p.is_Number: + rv = 0 + else: + if f.is_Poly: + gens = gens or f.gens + rv = Poly(p, gens).total_degree() + + return Integer(rv) + + +@public +def degree_list(f, *gens, **args): + """ + Return a list of degrees of ``f`` in all variables. + + Examples + ======== + + >>> from sympy import degree_list + >>> from sympy.abc import x, y + + >>> degree_list(x**2 + y*x + 1) + (2, 1) + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('degree_list', 1, exc) + + degrees = F.degree_list() + + return tuple(map(Integer, degrees)) + + +@public +def LC(f, *gens, **args): + """ + Return the leading coefficient of ``f``. + + Examples + ======== + + >>> from sympy import LC + >>> from sympy.abc import x, y + + >>> LC(4*x**2 + 2*x*y**2 + x*y + 3*y) + 4 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('LC', 1, exc) + + return F.LC(order=opt.order) + + +@public +def LM(f, *gens, **args): + """ + Return the leading monomial of ``f``. + + Examples + ======== + + >>> from sympy import LM + >>> from sympy.abc import x, y + + >>> LM(4*x**2 + 2*x*y**2 + x*y + 3*y) + x**2 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('LM', 1, exc) + + monom = F.LM(order=opt.order) + return monom.as_expr() + + +@public +def LT(f, *gens, **args): + """ + Return the leading term of ``f``. + + Examples + ======== + + >>> from sympy import LT + >>> from sympy.abc import x, y + + >>> LT(4*x**2 + 2*x*y**2 + x*y + 3*y) + 4*x**2 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('LT', 1, exc) + + monom, coeff = F.LT(order=opt.order) + return coeff*monom.as_expr() + + +@public +def pdiv(f, g, *gens, **args): + """ + Compute polynomial pseudo-division of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import pdiv + >>> from sympy.abc import x + + >>> pdiv(x**2 + 1, 2*x - 4) + (2*x + 4, 20) + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('pdiv', 2, exc) + + q, r = F.pdiv(G) + + if not opt.polys: + return q.as_expr(), r.as_expr() + else: + return q, r + + +@public +def prem(f, g, *gens, **args): + """ + Compute polynomial pseudo-remainder of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import prem + >>> from sympy.abc import x + + >>> prem(x**2 + 1, 2*x - 4) + 20 + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('prem', 2, exc) + + r = F.prem(G) + + if not opt.polys: + return r.as_expr() + else: + return r + + +@public +def pquo(f, g, *gens, **args): + """ + Compute polynomial pseudo-quotient of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import pquo + >>> from sympy.abc import x + + >>> pquo(x**2 + 1, 2*x - 4) + 2*x + 4 + >>> pquo(x**2 - 1, 2*x - 1) + 2*x + 1 + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('pquo', 2, exc) + + try: + q = F.pquo(G) + except ExactQuotientFailed: + raise ExactQuotientFailed(f, g) + + if not opt.polys: + return q.as_expr() + else: + return q + + +@public +def pexquo(f, g, *gens, **args): + """ + Compute polynomial exact pseudo-quotient of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import pexquo + >>> from sympy.abc import x + + >>> pexquo(x**2 - 1, 2*x - 2) + 2*x + 2 + + >>> pexquo(x**2 + 1, 2*x - 4) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1 + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('pexquo', 2, exc) + + q = F.pexquo(G) + + if not opt.polys: + return q.as_expr() + else: + return q + + +@public +def div(f, g, *gens, **args): + """ + Compute polynomial division of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import div, ZZ, QQ + >>> from sympy.abc import x + + >>> div(x**2 + 1, 2*x - 4, domain=ZZ) + (0, x**2 + 1) + >>> div(x**2 + 1, 2*x - 4, domain=QQ) + (x/2 + 1, 5) + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('div', 2, exc) + + q, r = F.div(G, auto=opt.auto) + + if not opt.polys: + return q.as_expr(), r.as_expr() + else: + return q, r + + +@public +def rem(f, g, *gens, **args): + """ + Compute polynomial remainder of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import rem, ZZ, QQ + >>> from sympy.abc import x + + >>> rem(x**2 + 1, 2*x - 4, domain=ZZ) + x**2 + 1 + >>> rem(x**2 + 1, 2*x - 4, domain=QQ) + 5 + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('rem', 2, exc) + + r = F.rem(G, auto=opt.auto) + + if not opt.polys: + return r.as_expr() + else: + return r + + +@public +def quo(f, g, *gens, **args): + """ + Compute polynomial quotient of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import quo + >>> from sympy.abc import x + + >>> quo(x**2 + 1, 2*x - 4) + x/2 + 1 + >>> quo(x**2 - 1, x - 1) + x + 1 + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('quo', 2, exc) + + q = F.quo(G, auto=opt.auto) + + if not opt.polys: + return q.as_expr() + else: + return q + + +@public +def exquo(f, g, *gens, **args): + """ + Compute polynomial exact quotient of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import exquo + >>> from sympy.abc import x + + >>> exquo(x**2 - 1, x - 1) + x + 1 + + >>> exquo(x**2 + 1, 2*x - 4) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1 + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('exquo', 2, exc) + + q = F.exquo(G, auto=opt.auto) + + if not opt.polys: + return q.as_expr() + else: + return q + + +@public +def half_gcdex(f, g, *gens, **args): + """ + Half extended Euclidean algorithm of ``f`` and ``g``. + + Returns ``(s, h)`` such that ``h = gcd(f, g)`` and ``s*f = h (mod g)``. + + Examples + ======== + + >>> from sympy import half_gcdex + >>> from sympy.abc import x + + >>> half_gcdex(x**4 - 2*x**3 - 6*x**2 + 12*x + 15, x**3 + x**2 - 4*x - 4) + (3/5 - x/5, x + 1) + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + s, h = domain.half_gcdex(a, b) + except NotImplementedError: + raise ComputationFailed('half_gcdex', 2, exc) + else: + return domain.to_sympy(s), domain.to_sympy(h) + + s, h = F.half_gcdex(G, auto=opt.auto) + + if not opt.polys: + return s.as_expr(), h.as_expr() + else: + return s, h + + +@public +def gcdex(f, g, *gens, **args): + """ + Extended Euclidean algorithm of ``f`` and ``g``. + + Returns ``(s, t, h)`` such that ``h = gcd(f, g)`` and ``s*f + t*g = h``. + + Examples + ======== + + >>> from sympy import gcdex + >>> from sympy.abc import x + + >>> gcdex(x**4 - 2*x**3 - 6*x**2 + 12*x + 15, x**3 + x**2 - 4*x - 4) + (3/5 - x/5, x**2/5 - 6*x/5 + 2, x + 1) + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + s, t, h = domain.gcdex(a, b) + except NotImplementedError: + raise ComputationFailed('gcdex', 2, exc) + else: + return domain.to_sympy(s), domain.to_sympy(t), domain.to_sympy(h) + + s, t, h = F.gcdex(G, auto=opt.auto) + + if not opt.polys: + return s.as_expr(), t.as_expr(), h.as_expr() + else: + return s, t, h + + +@public +def invert(f, g, *gens, **args): + """ + Invert ``f`` modulo ``g`` when possible. + + Examples + ======== + + >>> from sympy import invert, S, mod_inverse + >>> from sympy.abc import x + + >>> invert(x**2 - 1, 2*x - 1) + -4/3 + + >>> invert(x**2 - 1, x - 1) + Traceback (most recent call last): + ... + NotInvertible: zero divisor + + For more efficient inversion of Rationals, + use the :obj:`sympy.core.intfunc.mod_inverse` function: + + >>> mod_inverse(3, 5) + 2 + >>> (S(2)/5).invert(S(7)/3) + 5/2 + + See Also + ======== + sympy.core.intfunc.mod_inverse + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + return domain.to_sympy(domain.invert(a, b)) + except NotImplementedError: + raise ComputationFailed('invert', 2, exc) + + h = F.invert(G, auto=opt.auto) + + if not opt.polys: + return h.as_expr() + else: + return h + + +@public +def subresultants(f, g, *gens, **args): + """ + Compute subresultant PRS of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import subresultants + >>> from sympy.abc import x + + >>> subresultants(x**2 + 1, x**2 - 1) + [x**2 + 1, x**2 - 1, -2] + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('subresultants', 2, exc) + + result = F.subresultants(G) + + if not opt.polys: + return [r.as_expr() for r in result] + else: + return result + + +@public +def resultant(f, g, *gens, includePRS=False, **args): + """ + Compute resultant of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import resultant + >>> from sympy.abc import x + + >>> resultant(x**2 + 1, x**2 - 1) + 4 + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('resultant', 2, exc) + + if includePRS: + result, R = F.resultant(G, includePRS=includePRS) + else: + result = F.resultant(G) + + if not opt.polys: + if includePRS: + return result.as_expr(), [r.as_expr() for r in R] + return result.as_expr() + else: + if includePRS: + return result, R + return result + + +@public +def discriminant(f, *gens, **args): + """ + Compute discriminant of ``f``. + + Examples + ======== + + >>> from sympy import discriminant + >>> from sympy.abc import x + + >>> discriminant(x**2 + 2*x + 3) + -8 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('discriminant', 1, exc) + + result = F.discriminant() + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def cofactors(f, g, *gens, **args): + """ + Compute GCD and cofactors of ``f`` and ``g``. + + Returns polynomials ``(h, cff, cfg)`` such that ``h = gcd(f, g)``, and + ``cff = quo(f, h)`` and ``cfg = quo(g, h)`` are, so called, cofactors + of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import cofactors + >>> from sympy.abc import x + + >>> cofactors(x**2 - 1, x**2 - 3*x + 2) + (x - 1, x + 1, x - 2) + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + h, cff, cfg = domain.cofactors(a, b) + except NotImplementedError: + raise ComputationFailed('cofactors', 2, exc) + else: + return domain.to_sympy(h), domain.to_sympy(cff), domain.to_sympy(cfg) + + h, cff, cfg = F.cofactors(G) + + if not opt.polys: + return h.as_expr(), cff.as_expr(), cfg.as_expr() + else: + return h, cff, cfg + + +@public +def gcd_list(seq, *gens, **args): + """ + Compute GCD of a list of polynomials. + + Examples + ======== + + >>> from sympy import gcd_list + >>> from sympy.abc import x + + >>> gcd_list([x**3 - 1, x**2 - 1, x**2 - 3*x + 2]) + x - 1 + + """ + seq = sympify(seq) + + def try_non_polynomial_gcd(seq): + if not gens and not args: + domain, numbers = construct_domain(seq) + + if not numbers: + return domain.zero + elif domain.is_Numerical: + result, numbers = numbers[0], numbers[1:] + + for number in numbers: + result = domain.gcd(result, number) + + if domain.is_one(result): + break + + return domain.to_sympy(result) + + return None + + result = try_non_polynomial_gcd(seq) + + if result is not None: + return result + + options.allowed_flags(args, ['polys']) + + try: + polys, opt = parallel_poly_from_expr(seq, *gens, **args) + + # gcd for domain Q[irrational] (purely algebraic irrational) + if len(seq) > 1 and all(elt.is_algebraic and elt.is_irrational for elt in seq): + a = seq[-1] + lst = [ (a/elt).ratsimp() for elt in seq[:-1] ] + if all(frc.is_rational for frc in lst): + lc = 1 + for frc in lst: + lc = lcm(lc, frc.as_numer_denom()[0]) + # abs ensures that the gcd is always non-negative + return abs(a/lc) + + except PolificationFailed as exc: + result = try_non_polynomial_gcd(exc.exprs) + + if result is not None: + return result + else: + raise ComputationFailed('gcd_list', len(seq), exc) + + if not polys: + if not opt.polys: + return S.Zero + else: + return Poly(0, opt=opt) + + result, polys = polys[0], polys[1:] + + for poly in polys: + result = result.gcd(poly) + + if result.is_one: + break + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def gcd(f, g=None, *gens, **args): + """ + Compute GCD of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import gcd + >>> from sympy.abc import x + + >>> gcd(x**2 - 1, x**2 - 3*x + 2) + x - 1 + + """ + if hasattr(f, '__iter__'): + if g is not None: + gens = (g,) + gens + + return gcd_list(f, *gens, **args) + elif g is None: + raise TypeError("gcd() takes 2 arguments or a sequence of arguments") + + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + + # gcd for domain Q[irrational] (purely algebraic irrational) + a, b = map(sympify, (f, g)) + if a.is_algebraic and a.is_irrational and b.is_algebraic and b.is_irrational: + frc = (a/b).ratsimp() + if frc.is_rational: + # abs ensures that the returned gcd is always non-negative + return abs(a/frc.as_numer_denom()[0]) + + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + return domain.to_sympy(domain.gcd(a, b)) + except NotImplementedError: + raise ComputationFailed('gcd', 2, exc) + + result = F.gcd(G) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def lcm_list(seq, *gens, **args): + """ + Compute LCM of a list of polynomials. + + Examples + ======== + + >>> from sympy import lcm_list + >>> from sympy.abc import x + + >>> lcm_list([x**3 - 1, x**2 - 1, x**2 - 3*x + 2]) + x**5 - x**4 - 2*x**3 - x**2 + x + 2 + + """ + seq = sympify(seq) + + def try_non_polynomial_lcm(seq) -> Optional[Expr]: + if not gens and not args: + domain, numbers = construct_domain(seq) + + if not numbers: + return domain.to_sympy(domain.one) + elif domain.is_Numerical: + result, numbers = numbers[0], numbers[1:] + + for number in numbers: + result = domain.lcm(result, number) + + return domain.to_sympy(result) + + return None + + result = try_non_polynomial_lcm(seq) + + if result is not None: + return result + + options.allowed_flags(args, ['polys']) + + try: + polys, opt = parallel_poly_from_expr(seq, *gens, **args) + + # lcm for domain Q[irrational] (purely algebraic irrational) + if len(seq) > 1 and all(elt.is_algebraic and elt.is_irrational for elt in seq): + a = seq[-1] + lst = [ (a/elt).ratsimp() for elt in seq[:-1] ] + if all(frc.is_rational for frc in lst): + lc = 1 + for frc in lst: + lc = lcm(lc, frc.as_numer_denom()[1]) + return a*lc + + except PolificationFailed as exc: + result = try_non_polynomial_lcm(exc.exprs) + + if result is not None: + return result + else: + raise ComputationFailed('lcm_list', len(seq), exc) + + if not polys: + if not opt.polys: + return S.One + else: + return Poly(1, opt=opt) + + result, polys = polys[0], polys[1:] + + for poly in polys: + result = result.lcm(poly) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def lcm(f, g=None, *gens, **args): + """ + Compute LCM of ``f`` and ``g``. + + Examples + ======== + + >>> from sympy import lcm + >>> from sympy.abc import x + + >>> lcm(x**2 - 1, x**2 - 3*x + 2) + x**3 - 2*x**2 - x + 2 + + """ + if hasattr(f, '__iter__'): + if g is not None: + gens = (g,) + gens + + return lcm_list(f, *gens, **args) + elif g is None: + raise TypeError("lcm() takes 2 arguments or a sequence of arguments") + + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + + # lcm for domain Q[irrational] (purely algebraic irrational) + a, b = map(sympify, (f, g)) + if a.is_algebraic and a.is_irrational and b.is_algebraic and b.is_irrational: + frc = (a/b).ratsimp() + if frc.is_rational: + return a*frc.as_numer_denom()[1] + + except PolificationFailed as exc: + domain, (a, b) = construct_domain(exc.exprs) + + try: + return domain.to_sympy(domain.lcm(a, b)) + except NotImplementedError: + raise ComputationFailed('lcm', 2, exc) + + result = F.lcm(G) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def terms_gcd(f, *gens, **args): + """ + Remove GCD of terms from ``f``. + + If the ``deep`` flag is True, then the arguments of ``f`` will have + terms_gcd applied to them. + + If a fraction is factored out of ``f`` and ``f`` is an Add, then + an unevaluated Mul will be returned so that automatic simplification + does not redistribute it. The hint ``clear``, when set to False, can be + used to prevent such factoring when all coefficients are not fractions. + + Examples + ======== + + >>> from sympy import terms_gcd, cos + >>> from sympy.abc import x, y + >>> terms_gcd(x**6*y**2 + x**3*y, x, y) + x**3*y*(x**3*y + 1) + + The default action of polys routines is to expand the expression + given to them. terms_gcd follows this behavior: + + >>> terms_gcd((3+3*x)*(x+x*y)) + 3*x*(x*y + x + y + 1) + + If this is not desired then the hint ``expand`` can be set to False. + In this case the expression will be treated as though it were comprised + of one or more terms: + + >>> terms_gcd((3+3*x)*(x+x*y), expand=False) + (3*x + 3)*(x*y + x) + + In order to traverse factors of a Mul or the arguments of other + functions, the ``deep`` hint can be used: + + >>> terms_gcd((3 + 3*x)*(x + x*y), expand=False, deep=True) + 3*x*(x + 1)*(y + 1) + >>> terms_gcd(cos(x + x*y), deep=True) + cos(x*(y + 1)) + + Rationals are factored out by default: + + >>> terms_gcd(x + y/2) + (2*x + y)/2 + + Only the y-term had a coefficient that was a fraction; if one + does not want to factor out the 1/2 in cases like this, the + flag ``clear`` can be set to False: + + >>> terms_gcd(x + y/2, clear=False) + x + y/2 + >>> terms_gcd(x*y/2 + y**2, clear=False) + y*(x/2 + y) + + The ``clear`` flag is ignored if all coefficients are fractions: + + >>> terms_gcd(x/3 + y/2, clear=False) + (2*x + 3*y)/6 + + See Also + ======== + sympy.core.exprtools.gcd_terms, sympy.core.exprtools.factor_terms + + """ + + orig = sympify(f) + + if isinstance(f, Equality): + return Equality(*(terms_gcd(s, *gens, **args) for s in [f.lhs, f.rhs])) + elif isinstance(f, Relational): + raise TypeError("Inequalities cannot be used with terms_gcd. Found: %s" %(f,)) + + if not isinstance(f, Expr) or f.is_Atom: + return orig + + if args.get('deep', False): + new = f.func(*[terms_gcd(a, *gens, **args) for a in f.args]) + args.pop('deep') + args['expand'] = False + return terms_gcd(new, *gens, **args) + + clear = args.pop('clear', True) + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + return exc.expr + + J, f = F.terms_gcd() + + if opt.domain.is_Ring: + if opt.domain.is_Field: + denom, f = f.clear_denoms(convert=True) + + coeff, f = f.primitive() + + if opt.domain.is_Field: + coeff /= denom + else: + coeff = S.One + + term = Mul(*[x**j for x, j in zip(f.gens, J)]) + if equal_valued(coeff, 1): + coeff = S.One + if term == 1: + return orig + + if clear: + return _keep_coeff(coeff, term*f.as_expr()) + # base the clearing on the form of the original expression, not + # the (perhaps) Mul that we have now + coeff, f = _keep_coeff(coeff, f.as_expr(), clear=False).as_coeff_Mul() + return _keep_coeff(coeff, term*f, clear=False) + + +@public +def trunc(f, p, *gens, **args): + """ + Reduce ``f`` modulo a constant ``p``. + + Examples + ======== + + >>> from sympy import trunc + >>> from sympy.abc import x + + >>> trunc(2*x**3 + 3*x**2 + 5*x + 7, 3) + -x**3 - x + 1 + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('trunc', 1, exc) + + result = F.trunc(sympify(p)) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def monic(f, *gens, **args): + """ + Divide all coefficients of ``f`` by ``LC(f)``. + + Examples + ======== + + >>> from sympy import monic + >>> from sympy.abc import x + + >>> monic(3*x**2 + 4*x + 2) + x**2 + 4*x/3 + 2/3 + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('monic', 1, exc) + + result = F.monic(auto=opt.auto) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def content(f, *gens, **args): + """ + Compute GCD of coefficients of ``f``. + + Examples + ======== + + >>> from sympy import content + >>> from sympy.abc import x + + >>> content(6*x**2 + 8*x + 12) + 2 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('content', 1, exc) + + return F.content() + + +@public +def primitive(f, *gens, **args): + """ + Compute content and the primitive form of ``f``. + + Examples + ======== + + >>> from sympy.polys.polytools import primitive + >>> from sympy.abc import x + + >>> primitive(6*x**2 + 8*x + 12) + (2, 3*x**2 + 4*x + 6) + + >>> eq = (2 + 2*x)*x + 2 + + Expansion is performed by default: + + >>> primitive(eq) + (2, x**2 + x + 1) + + Set ``expand`` to False to shut this off. Note that the + extraction will not be recursive; use the as_content_primitive method + for recursive, non-destructive Rational extraction. + + >>> primitive(eq, expand=False) + (1, x*(2*x + 2) + 2) + + >>> eq.as_content_primitive() + (2, x*(x + 1) + 1) + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('primitive', 1, exc) + + cont, result = F.primitive() + if not opt.polys: + return cont, result.as_expr() + else: + return cont, result + + +@public +def compose(f, g, *gens, **args): + """ + Compute functional composition ``f(g)``. + + Examples + ======== + + >>> from sympy import compose + >>> from sympy.abc import x + + >>> compose(x**2 + x, x - 1) + x**2 - x + + """ + options.allowed_flags(args, ['polys']) + + try: + (F, G), opt = parallel_poly_from_expr((f, g), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('compose', 2, exc) + + result = F.compose(G) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def decompose(f, *gens, **args): + """ + Compute functional decomposition of ``f``. + + Examples + ======== + + >>> from sympy import decompose + >>> from sympy.abc import x + + >>> decompose(x**4 + 2*x**3 - x - 1) + [x**2 - x - 1, x**2 + x] + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('decompose', 1, exc) + + result = F.decompose() + + if not opt.polys: + return [r.as_expr() for r in result] + else: + return result + + +@public +def sturm(f, *gens, **args): + """ + Compute Sturm sequence of ``f``. + + Examples + ======== + + >>> from sympy import sturm + >>> from sympy.abc import x + + >>> sturm(x**3 - 2*x**2 + x - 3) + [x**3 - 2*x**2 + x - 3, 3*x**2 - 4*x + 1, 2*x/9 + 25/9, -2079/4] + + """ + options.allowed_flags(args, ['auto', 'polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('sturm', 1, exc) + + result = F.sturm(auto=opt.auto) + + if not opt.polys: + return [r.as_expr() for r in result] + else: + return result + + +@public +def gff_list(f, *gens, **args): + """ + Compute a list of greatest factorial factors of ``f``. + + Note that the input to ff() and rf() should be Poly instances to use the + definitions here. + + Examples + ======== + + >>> from sympy import gff_list, ff, Poly + >>> from sympy.abc import x + + >>> f = Poly(x**5 + 2*x**4 - x**3 - 2*x**2, x) + + >>> gff_list(f) + [(Poly(x, x, domain='ZZ'), 1), (Poly(x + 2, x, domain='ZZ'), 4)] + + >>> (ff(Poly(x), 1)*ff(Poly(x + 2), 4)) == f + True + + >>> f = Poly(x**12 + 6*x**11 - 11*x**10 - 56*x**9 + 220*x**8 + 208*x**7 - \ + 1401*x**6 + 1090*x**5 + 2715*x**4 - 6720*x**3 - 1092*x**2 + 5040*x, x) + + >>> gff_list(f) + [(Poly(x**3 + 7, x, domain='ZZ'), 2), (Poly(x**2 + 5*x, x, domain='ZZ'), 3)] + + >>> ff(Poly(x**3 + 7, x), 2)*ff(Poly(x**2 + 5*x, x), 3) == f + True + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('gff_list', 1, exc) + + factors = F.gff_list() + + if not opt.polys: + return [(g.as_expr(), k) for g, k in factors] + else: + return factors + + +@public +def gff(f, *gens, **args): + """Compute greatest factorial factorization of ``f``. """ + raise NotImplementedError('symbolic falling factorial') + + +@public +def sqf_norm(f, *gens, **args): + """ + Compute square-free norm of ``f``. + + Returns ``s``, ``f``, ``r``, such that ``g(x) = f(x-sa)`` and + ``r(x) = Norm(g(x))`` is a square-free polynomial over ``K``, + where ``a`` is the algebraic extension of the ground domain. + + Examples + ======== + + >>> from sympy import sqf_norm, sqrt + >>> from sympy.abc import x + + >>> sqf_norm(x**2 + 1, extension=[sqrt(3)]) + ([1], x**2 - 2*sqrt(3)*x + 4, x**4 - 4*x**2 + 16) + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('sqf_norm', 1, exc) + + s, g, r = F.sqf_norm() + + s_expr = [Integer(si) for si in s] + + if not opt.polys: + return s_expr, g.as_expr(), r.as_expr() + else: + return s_expr, g, r + + +@public +def sqf_part(f, *gens, **args): + """ + Compute square-free part of ``f``. + + Examples + ======== + + >>> from sympy import sqf_part + >>> from sympy.abc import x + + >>> sqf_part(x**3 - 3*x - 2) + x**2 - x - 2 + + """ + options.allowed_flags(args, ['polys']) + + try: + F, opt = poly_from_expr(f, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('sqf_part', 1, exc) + + result = F.sqf_part() + + if not opt.polys: + return result.as_expr() + else: + return result + + +def _poly_sort_key(poly): + """Sort a list of polys.""" + rep = poly.rep.to_list() + return (len(rep), len(poly.gens), str(poly.domain), rep) + + +def _sorted_factors(factors, method): + """Sort a list of ``(expr, exp)`` pairs. """ + if method == 'sqf': + def key(obj): + poly, exp = obj + rep = poly.rep.to_list() + return (exp, len(rep), len(poly.gens), str(poly.domain), rep) + else: + def key(obj): + poly, exp = obj + rep = poly.rep.to_list() + return (len(rep), len(poly.gens), exp, str(poly.domain), rep) + + return sorted(factors, key=key) + + +def _factors_product(factors): + """Multiply a list of ``(expr, exp)`` pairs. """ + return Mul(*[f.as_expr()**k for f, k in factors]) + + +def _symbolic_factor_list(expr, opt, method): + """Helper function for :func:`_symbolic_factor`. """ + coeff, factors = S.One, [] + + args = [i._eval_factor() if hasattr(i, '_eval_factor') else i + for i in Mul.make_args(expr)] + for arg in args: + if arg.is_Number or (isinstance(arg, Expr) and pure_complex(arg)): + coeff *= arg + continue + elif arg.is_Pow and arg.base != S.Exp1: + base, exp = arg.args + if base.is_Number and exp.is_Number: + coeff *= arg + continue + if base.is_Number: + factors.append((base, exp)) + continue + else: + base, exp = arg, S.One + + try: + poly, _ = _poly_from_expr(base, opt) + except PolificationFailed as exc: + factors.append((exc.expr, exp)) + else: + func = getattr(poly, method + '_list') + + _coeff, _factors = func() + if _coeff is not S.One: + if exp.is_Integer: + coeff *= _coeff**exp + elif _coeff.is_positive: + factors.append((_coeff, exp)) + else: + _factors.append((_coeff, S.One)) + + if exp is S.One: + factors.extend(_factors) + elif exp.is_integer: + factors.extend([(f, k*exp) for f, k in _factors]) + else: + other = [] + + for f, k in _factors: + if f.as_expr().is_positive: + factors.append((f, k*exp)) + else: + other.append((f, k)) + + factors.append((_factors_product(other), exp)) + if method == 'sqf': + factors = [(reduce(mul, (f for f, _ in factors if _ == k)), k) + for k in {i for _, i in factors}] + #collect duplicates + rv = defaultdict(int) + for k, v in factors: + rv[k] += v + return coeff, list(rv.items()) + + +def _symbolic_factor(expr, opt, method): + """Helper function for :func:`_factor`. """ + if isinstance(expr, Expr): + if hasattr(expr,'_eval_factor'): + return expr._eval_factor() + coeff, factors = _symbolic_factor_list(together(expr, fraction=opt['fraction']), opt, method) + return _keep_coeff(coeff, _factors_product(factors)) + elif hasattr(expr, 'args'): + return expr.func(*[_symbolic_factor(arg, opt, method) for arg in expr.args]) + elif hasattr(expr, '__iter__'): + return expr.__class__([_symbolic_factor(arg, opt, method) for arg in expr]) + else: + return expr + + +def _generic_factor_list(expr, gens, args, method): + """Helper function for :func:`sqf_list` and :func:`factor_list`. """ + options.allowed_flags(args, ['frac', 'polys']) + opt = options.build_options(gens, args) + + expr = sympify(expr) + + if isinstance(expr, (Expr, Poly)): + if isinstance(expr, Poly): + numer, denom = expr, 1 + else: + numer, denom = together(expr).as_numer_denom() + + cp, fp = _symbolic_factor_list(numer, opt, method) + cq, fq = _symbolic_factor_list(denom, opt, method) + + if fq and not opt.frac: + raise PolynomialError("a polynomial expected, got %s" % expr) + + _opt = opt.clone({"expand": True}) + + for factors in (fp, fq): + for i, (f, k) in enumerate(factors): + if not f.is_Poly: + f, _ = _poly_from_expr(f, _opt) + factors[i] = (f, k) + + fp = _sorted_factors(fp, method) + fq = _sorted_factors(fq, method) + + if not opt.polys: + fp = [(f.as_expr(), k) for f, k in fp] + fq = [(f.as_expr(), k) for f, k in fq] + + coeff = cp/cq + + if not opt.frac: + return coeff, fp + else: + return coeff, fp, fq + else: + raise PolynomialError("a polynomial expected, got %s" % expr) + + +def _generic_factor(expr, gens, args, method): + """Helper function for :func:`sqf` and :func:`factor`. """ + fraction = args.pop('fraction', True) + options.allowed_flags(args, []) + opt = options.build_options(gens, args) + opt['fraction'] = fraction + return _symbolic_factor(sympify(expr), opt, method) + + +def to_rational_coeffs(f): + """ + try to transform a polynomial to have rational coefficients + + try to find a transformation ``x = alpha*y`` + + ``f(x) = lc*alpha**n * g(y)`` where ``g`` is a polynomial with + rational coefficients, ``lc`` the leading coefficient. + + If this fails, try ``x = y + beta`` + ``f(x) = g(y)`` + + Returns ``None`` if ``g`` not found; + ``(lc, alpha, None, g)`` in case of rescaling + ``(None, None, beta, g)`` in case of translation + + Notes + ===== + + Currently it transforms only polynomials without roots larger than 2. + + Examples + ======== + + >>> from sympy import sqrt, Poly, simplify + >>> from sympy.polys.polytools import to_rational_coeffs + >>> from sympy.abc import x + >>> p = Poly(((x**2-1)*(x-2)).subs({x:x*(1 + sqrt(2))}), x, domain='EX') + >>> lc, r, _, g = to_rational_coeffs(p) + >>> lc, r + (7 + 5*sqrt(2), 2 - 2*sqrt(2)) + >>> g + Poly(x**3 + x**2 - 1/4*x - 1/4, x, domain='QQ') + >>> r1 = simplify(1/r) + >>> Poly(lc*r**3*(g.as_expr()).subs({x:x*r1}), x, domain='EX') == p + True + + """ + from sympy.simplify.simplify import simplify + + def _try_rescale(f, f1=None): + """ + try rescaling ``x -> alpha*x`` to convert f to a polynomial + with rational coefficients. + Returns ``alpha, f``; if the rescaling is successful, + ``alpha`` is the rescaling factor, and ``f`` is the rescaled + polynomial; else ``alpha`` is ``None``. + """ + if not len(f.gens) == 1 or not (f.gens[0]).is_Atom: + return None, f + n = f.degree() + lc = f.LC() + f1 = f1 or f1.monic() + coeffs = f1.all_coeffs()[1:] + coeffs = [simplify(coeffx) for coeffx in coeffs] + if len(coeffs) > 1 and coeffs[-2]: + rescale1_x = simplify(coeffs[-2]/coeffs[-1]) + coeffs1 = [] + for i in range(len(coeffs)): + coeffx = simplify(coeffs[i]*rescale1_x**(i + 1)) + if not coeffx.is_rational: + break + coeffs1.append(coeffx) + else: + rescale_x = simplify(1/rescale1_x) + x = f.gens[0] + v = [x**n] + for i in range(1, n + 1): + v.append(coeffs1[i - 1]*x**(n - i)) + f = Add(*v) + f = Poly(f) + return lc, rescale_x, f + return None + + def _try_translate(f, f1=None): + """ + try translating ``x -> x + alpha`` to convert f to a polynomial + with rational coefficients. + Returns ``alpha, f``; if the translating is successful, + ``alpha`` is the translating factor, and ``f`` is the shifted + polynomial; else ``alpha`` is ``None``. + """ + if not len(f.gens) == 1 or not (f.gens[0]).is_Atom: + return None, f + n = f.degree() + f1 = f1 or f1.monic() + coeffs = f1.all_coeffs()[1:] + c = simplify(coeffs[0]) + if c.is_Add and not c.is_rational: + rat, nonrat = sift(c.args, + lambda z: z.is_rational is True, binary=True) + alpha = -c.func(*nonrat)/n + f2 = f1.shift(alpha) + return alpha, f2 + return None + + def _has_square_roots(p): + """ + Return True if ``f`` is a sum with square roots but no other root + """ + coeffs = p.coeffs() + has_sq = False + for y in coeffs: + for x in Add.make_args(y): + f = Factors(x).factors + r = [wx.q for b, wx in f.items() if + b.is_number and wx.is_Rational and wx.q >= 2] + if not r: + continue + if min(r) == 2: + has_sq = True + if max(r) > 2: + return False + return has_sq + + if f.get_domain().is_EX and _has_square_roots(f): + f1 = f.monic() + r = _try_rescale(f, f1) + if r: + return r[0], r[1], None, r[2] + else: + r = _try_translate(f, f1) + if r: + return None, None, r[0], r[1] + return None + + +def _torational_factor_list(p, x): + """ + helper function to factor polynomial using to_rational_coeffs + + Examples + ======== + + >>> from sympy.polys.polytools import _torational_factor_list + >>> from sympy.abc import x + >>> from sympy import sqrt, expand, Mul + >>> p = expand(((x**2-1)*(x-2)).subs({x:x*(1 + sqrt(2))})) + >>> factors = _torational_factor_list(p, x); factors + (-2, [(-x*(1 + sqrt(2))/2 + 1, 1), (-x*(1 + sqrt(2)) - 1, 1), (-x*(1 + sqrt(2)) + 1, 1)]) + >>> expand(factors[0]*Mul(*[z[0] for z in factors[1]])) == p + True + >>> p = expand(((x**2-1)*(x-2)).subs({x:x + sqrt(2)})) + >>> factors = _torational_factor_list(p, x); factors + (1, [(x - 2 + sqrt(2), 1), (x - 1 + sqrt(2), 1), (x + 1 + sqrt(2), 1)]) + >>> expand(factors[0]*Mul(*[z[0] for z in factors[1]])) == p + True + + """ + from sympy.simplify.simplify import simplify + p1 = Poly(p, x, domain='EX') + n = p1.degree() + res = to_rational_coeffs(p1) + if not res: + return None + lc, r, t, g = res + factors = factor_list(g.as_expr()) + if lc: + c = simplify(factors[0]*lc*r**n) + r1 = simplify(1/r) + a = [] + for z in factors[1:][0]: + a.append((simplify(z[0].subs({x: x*r1})), z[1])) + else: + c = factors[0] + a = [] + for z in factors[1:][0]: + a.append((z[0].subs({x: x - t}), z[1])) + return (c, a) + + +@public +def sqf_list(f, *gens, **args): + """ + Compute a list of square-free factors of ``f``. + + Examples + ======== + + >>> from sympy import sqf_list + >>> from sympy.abc import x + + >>> sqf_list(2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16) + (2, [(x + 1, 2), (x + 2, 3)]) + + """ + return _generic_factor_list(f, gens, args, method='sqf') + + +@public +def sqf(f, *gens, **args): + """ + Compute square-free factorization of ``f``. + + Examples + ======== + + >>> from sympy import sqf + >>> from sympy.abc import x + + >>> sqf(2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16) + 2*(x + 1)**2*(x + 2)**3 + + """ + return _generic_factor(f, gens, args, method='sqf') + + +@public +def factor_list(f, *gens, **args): + """ + Compute a list of irreducible factors of ``f``. + + Examples + ======== + + >>> from sympy import factor_list + >>> from sympy.abc import x, y + + >>> factor_list(2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y) + (2, [(x + y, 1), (x**2 + 1, 2)]) + + """ + return _generic_factor_list(f, gens, args, method='factor') + + +@public +def factor(f, *gens, deep=False, **args): + """ + Compute the factorization of expression, ``f``, into irreducibles. (To + factor an integer into primes, use ``factorint``.) + + There two modes implemented: symbolic and formal. If ``f`` is not an + instance of :class:`Poly` and generators are not specified, then the + former mode is used. Otherwise, the formal mode is used. + + In symbolic mode, :func:`factor` will traverse the expression tree and + factor its components without any prior expansion, unless an instance + of :class:`~.Add` is encountered (in this case formal factorization is + used). This way :func:`factor` can handle large or symbolic exponents. + + By default, the factorization is computed over the rationals. To factor + over other domain, e.g. an algebraic or finite field, use appropriate + options: ``extension``, ``modulus`` or ``domain``. + + Examples + ======== + + >>> from sympy import factor, sqrt, exp + >>> from sympy.abc import x, y + + >>> factor(2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y) + 2*(x + y)*(x**2 + 1)**2 + + >>> factor(x**2 + 1) + x**2 + 1 + >>> factor(x**2 + 1, modulus=2) + (x + 1)**2 + >>> factor(x**2 + 1, gaussian=True) + (x - I)*(x + I) + + >>> factor(x**2 - 2, extension=sqrt(2)) + (x - sqrt(2))*(x + sqrt(2)) + + >>> factor((x**2 - 1)/(x**2 + 4*x + 4)) + (x - 1)*(x + 1)/(x + 2)**2 + >>> factor((x**2 + 4*x + 4)**10000000*(x**2 + 1)) + (x + 2)**20000000*(x**2 + 1) + + By default, factor deals with an expression as a whole: + + >>> eq = 2**(x**2 + 2*x + 1) + >>> factor(eq) + 2**(x**2 + 2*x + 1) + + If the ``deep`` flag is True then subexpressions will + be factored: + + >>> factor(eq, deep=True) + 2**((x + 1)**2) + + If the ``fraction`` flag is False then rational expressions + will not be combined. By default it is True. + + >>> factor(5*x + 3*exp(2 - 7*x), deep=True) + (5*x*exp(7*x) + 3*exp(2))*exp(-7*x) + >>> factor(5*x + 3*exp(2 - 7*x), deep=True, fraction=False) + 5*x + 3*exp(2)*exp(-7*x) + + See Also + ======== + sympy.ntheory.factor_.factorint + + """ + f = sympify(f) + if deep: + def _try_factor(expr): + """ + Factor, but avoid changing the expression when unable to. + """ + fac = factor(expr, *gens, **args) + if fac.is_Mul or fac.is_Pow: + return fac + return expr + + f = bottom_up(f, _try_factor) + # clean up any subexpressions that may have been expanded + # while factoring out a larger expression + partials = {} + muladd = f.atoms(Mul, Add) + for p in muladd: + fac = factor(p, *gens, **args) + if (fac.is_Mul or fac.is_Pow) and fac != p: + partials[p] = fac + return f.xreplace(partials) + + try: + return _generic_factor(f, gens, args, method='factor') + except PolynomialError: + if not f.is_commutative: + return factor_nc(f) + else: + raise + + +@public +def intervals(F, all=False, eps=None, inf=None, sup=None, strict=False, fast=False, sqf=False): + """ + Compute isolating intervals for roots of ``f``. + + Examples + ======== + + >>> from sympy import intervals + >>> from sympy.abc import x + + >>> intervals(x**2 - 3) + [((-2, -1), 1), ((1, 2), 1)] + >>> intervals(x**2 - 3, eps=1e-2) + [((-26/15, -19/11), 1), ((19/11, 26/15), 1)] + + """ + if not hasattr(F, '__iter__'): + try: + F = Poly(F) + except GeneratorsNeeded: + return [] + + return F.intervals(all=all, eps=eps, inf=inf, sup=sup, fast=fast, sqf=sqf) + else: + polys, opt = parallel_poly_from_expr(F, domain='QQ') + + if len(opt.gens) > 1: + raise MultivariatePolynomialError + + for i, poly in enumerate(polys): + polys[i] = poly.rep.to_list() + + if eps is not None: + eps = opt.domain.convert(eps) + + if eps <= 0: + raise ValueError("'eps' must be a positive rational") + + if inf is not None: + inf = opt.domain.convert(inf) + if sup is not None: + sup = opt.domain.convert(sup) + + intervals = dup_isolate_real_roots_list(polys, opt.domain, + eps=eps, inf=inf, sup=sup, strict=strict, fast=fast) + + result = [] + + for (s, t), indices in intervals: + s, t = opt.domain.to_sympy(s), opt.domain.to_sympy(t) + result.append(((s, t), indices)) + + return result + + +@public +def refine_root(f, s, t, eps=None, steps=None, fast=False, check_sqf=False): + """ + Refine an isolating interval of a root to the given precision. + + Examples + ======== + + >>> from sympy import refine_root + >>> from sympy.abc import x + + >>> refine_root(x**2 - 3, 1, 2, eps=1e-2) + (19/11, 26/15) + + """ + try: + F = Poly(f) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except GeneratorsNeeded: + raise PolynomialError( + "Cannot refine a root of %s, not a polynomial" % f) + + return F.refine_root(s, t, eps=eps, steps=steps, fast=fast, check_sqf=check_sqf) + + +@public +def count_roots(f, inf=None, sup=None): + """ + Return the number of roots of ``f`` in ``[inf, sup]`` interval. + + If one of ``inf`` or ``sup`` is complex, it will return the number of roots + in the complex rectangle with corners at ``inf`` and ``sup``. + + Examples + ======== + + >>> from sympy import count_roots, I + >>> from sympy.abc import x + + >>> count_roots(x**4 - 4, -3, 3) + 2 + >>> count_roots(x**4 - 4, 0, 1 + 3*I) + 1 + + """ + try: + F = Poly(f, greedy=False) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except GeneratorsNeeded: + raise PolynomialError("Cannot count roots of %s, not a polynomial" % f) + + return F.count_roots(inf=inf, sup=sup) + + +@public +def all_roots(f, multiple=True, radicals=True, extension=False): + """ + Returns the real and complex roots of ``f`` with multiplicities. + + Explanation + =========== + + Finds all real and complex roots of a univariate polynomial with rational + coefficients of any degree exactly. The roots are represented in the form + given by :func:`~.rootof`. This is equivalent to using :func:`~.rootof` to + find each of the indexed roots. + + Examples + ======== + + >>> from sympy import all_roots + >>> from sympy.abc import x, y + + >>> print(all_roots(x**3 + 1)) + [-1, 1/2 - sqrt(3)*I/2, 1/2 + sqrt(3)*I/2] + + Simple radical formulae are used in some cases but the cubic and quartic + formulae are avoided. Instead most non-rational roots will be represented + as :class:`~.ComplexRootOf`: + + >>> print(all_roots(x**3 + x + 1)) + [CRootOf(x**3 + x + 1, 0), CRootOf(x**3 + x + 1, 1), CRootOf(x**3 + x + 1, 2)] + + All roots of any polynomial with rational coefficients of any degree can be + represented using :py:class:`~.ComplexRootOf`. The use of + :py:class:`~.ComplexRootOf` bypasses limitations on the availability of + radical formulae for quintic and higher degree polynomials _[1]: + + >>> p = x**5 - x - 1 + >>> for r in all_roots(p): print(r) + CRootOf(x**5 - x - 1, 0) + CRootOf(x**5 - x - 1, 1) + CRootOf(x**5 - x - 1, 2) + CRootOf(x**5 - x - 1, 3) + CRootOf(x**5 - x - 1, 4) + >>> [r.evalf(3) for r in all_roots(p)] + [1.17, -0.765 - 0.352*I, -0.765 + 0.352*I, 0.181 - 1.08*I, 0.181 + 1.08*I] + + Irrational algebraic coefficients are handled by :func:`all_roots` + if `extension=True` is set. + + >>> from sympy import sqrt, expand + >>> p = expand((x - sqrt(2))*(x - sqrt(3))) + >>> print(p) + x**2 - sqrt(3)*x - sqrt(2)*x + sqrt(6) + >>> all_roots(p) + Traceback (most recent call last): + ... + NotImplementedError: sorted roots not supported over EX + >>> all_roots(p, extension=True) + [sqrt(2), sqrt(3)] + + Algebraic coefficients can be complex as well. + + >>> from sympy import I + >>> all_roots(x**2 - I, extension=True) + [-sqrt(2)/2 - sqrt(2)*I/2, sqrt(2)/2 + sqrt(2)*I/2] + >>> all_roots(x**2 - sqrt(2)*I, extension=True) + [-2**(3/4)/2 - 2**(3/4)*I/2, 2**(3/4)/2 + 2**(3/4)*I/2] + + Transcendental coefficients cannot currently be handled by + :func:`all_roots`. In the case of algebraic or transcendental coefficients + :func:`~.ground_roots` might be able to find some roots by factorisation: + + >>> from sympy import ground_roots + >>> ground_roots(p, x, extension=True) + {sqrt(2): 1, sqrt(3): 1} + + If the coefficients are numeric then :func:`~.nroots` can be used to find + all roots approximately: + + >>> from sympy import nroots + >>> nroots(p, 5) + [1.4142, 1.732] + + If the coefficients are symbolic then :func:`sympy.polys.polyroots.roots` + or :func:`~.ground_roots` should be used instead: + + >>> from sympy import roots, ground_roots + >>> p = x**2 - 3*x*y + 2*y**2 + >>> roots(p, x) + {y: 1, 2*y: 1} + >>> ground_roots(p, x) + {y: 1, 2*y: 1} + + Parameters + ========== + + f : :class:`~.Expr` or :class:`~.Poly` + A univariate polynomial with rational (or ``Float``) coefficients. + multiple : ``bool`` (default ``True``). + Whether to return a ``list`` of roots or a list of root/multiplicity + pairs. + radicals : ``bool`` (default ``True``) + Use simple radical formulae rather than :py:class:`~.ComplexRootOf` for + some irrational roots. + extension: ``bool`` (default ``False``) + Whether to construct an algebraic extension domain before computing + the roots. Setting to ``True`` is necessary for finding roots of a + polynomial with (irrational) algebraic coefficients but can be slow. + + Returns + ======= + + A list of :class:`~.Expr` (usually :class:`~.ComplexRootOf`) representing + the roots is returned with each root repeated according to its multiplicity + as a root of ``f``. The roots are always uniquely ordered with real roots + coming before complex roots. The real roots are in increasing order. + Complex roots are ordered by increasing real part and then increasing + imaginary part. + + If ``multiple=False`` is passed then a list of root/multiplicity pairs is + returned instead. + + If ``radicals=False`` is passed then all roots will be represented as + either rational numbers or :class:`~.ComplexRootOf`. + + See also + ======== + + Poly.all_roots: + The underlying :class:`Poly` method used by :func:`~.all_roots`. + rootof: + Compute a single numbered root of a univariate polynomial. + real_roots: + Compute all the real roots using :func:`~.rootof`. + ground_roots: + Compute some roots in the ground domain by factorisation. + nroots: + Compute all roots using approximate numerical techniques. + sympy.polys.polyroots.roots: + Compute symbolic expressions for roots using radical formulae. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Abel%E2%80%93Ruffini_theorem + """ + try: + if isinstance(f, Poly): + if extension and not f.domain.is_AlgebraicField: + F = Poly(f.expr, extension=True) + else: + F = f + else: + if extension: + F = Poly(f, extension=True) + else: + F = Poly(f, greedy=False) + + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except GeneratorsNeeded: + raise PolynomialError( + "Cannot compute real roots of %s, not a polynomial" % f) + + return F.all_roots(multiple=multiple, radicals=radicals) + + +@public +def real_roots(f, multiple=True, radicals=True, extension=False): + """ + Returns the real roots of ``f`` with multiplicities. + + Explanation + =========== + + Finds all real roots of a univariate polynomial with rational coefficients + of any degree exactly. The roots are represented in the form given by + :func:`~.rootof`. This is equivalent to using :func:`~.rootof` or + :func:`~.all_roots` and filtering out only the real roots. However if only + the real roots are needed then :func:`real_roots` is more efficient than + :func:`~.all_roots` because it computes only the real roots and avoids + costly complex root isolation routines. + + Examples + ======== + + >>> from sympy import real_roots + >>> from sympy.abc import x, y + + >>> real_roots(2*x**3 - 7*x**2 + 4*x + 4) + [-1/2, 2, 2] + >>> real_roots(2*x**3 - 7*x**2 + 4*x + 4, multiple=False) + [(-1/2, 1), (2, 2)] + + Real roots of any polynomial with rational coefficients of any degree can + be represented using :py:class:`~.ComplexRootOf`: + + >>> p = x**9 + 2*x + 2 + >>> print(real_roots(p)) + [CRootOf(x**9 + 2*x + 2, 0)] + >>> [r.evalf(3) for r in real_roots(p)] + [-0.865] + + All rational roots will be returned as rational numbers. Roots of some + simple factors will be expressed using radical or other formulae (unless + ``radicals=False`` is passed). All other roots will be expressed as + :class:`~.ComplexRootOf`. + + >>> p = (x + 7)*(x**2 - 2)*(x**3 + x + 1) + >>> print(real_roots(p)) + [-7, -sqrt(2), CRootOf(x**3 + x + 1, 0), sqrt(2)] + >>> print(real_roots(p, radicals=False)) + [-7, CRootOf(x**2 - 2, 0), CRootOf(x**3 + x + 1, 0), CRootOf(x**2 - 2, 1)] + + All returned root expressions will numerically evaluate to real numbers + with no imaginary part. This is in contrast to the expressions generated by + the cubic or quartic formulae as used by :func:`~.roots` which suffer from + casus irreducibilis [1]_: + + >>> from sympy import roots + >>> p = 2*x**3 - 9*x**2 - 6*x + 3 + >>> [r.evalf(5) for r in roots(p, multiple=True)] + [5.0365 - 0.e-11*I, 0.33984 + 0.e-13*I, -0.87636 + 0.e-10*I] + >>> [r.evalf(5) for r in real_roots(p, x)] + [-0.87636, 0.33984, 5.0365] + >>> [r.is_real for r in roots(p, multiple=True)] + [None, None, None] + >>> [r.is_real for r in real_roots(p)] + [True, True, True] + + Using :func:`real_roots` is equivalent to using :func:`~.all_roots` (or + :func:`~.rootof`) and filtering out only the real roots: + + >>> from sympy import all_roots + >>> r = [r for r in all_roots(p) if r.is_real] + >>> real_roots(p) == r + True + + If only the real roots are wanted then using :func:`real_roots` is faster + than using :func:`~.all_roots`. Using :func:`real_roots` avoids complex root + isolation which can be a lot slower than real root isolation especially for + polynomials of high degree which typically have many more complex roots + than real roots. + + Irrational algebraic coefficients are handled by :func:`real_roots` + if `extension=True` is set. + + >>> from sympy import sqrt, expand + >>> p = expand((x - sqrt(2))*(x - sqrt(3))) + >>> print(p) + x**2 - sqrt(3)*x - sqrt(2)*x + sqrt(6) + >>> real_roots(p) + Traceback (most recent call last): + ... + NotImplementedError: sorted roots not supported over EX + >>> real_roots(p, extension=True) + [sqrt(2), sqrt(3)] + + Transcendental coefficients cannot currently be handled by + :func:`real_roots`. In the case of algebraic or transcendental coefficients + :func:`~.ground_roots` might be able to find some roots by factorisation: + + >>> from sympy import ground_roots + >>> ground_roots(p, x, extension=True) + {sqrt(2): 1, sqrt(3): 1} + + If the coefficients are numeric then :func:`~.nroots` can be used to find + all roots approximately: + + >>> from sympy import nroots + >>> nroots(p, 5) + [1.4142, 1.732] + + If the coefficients are symbolic then :func:`sympy.polys.polyroots.roots` + or :func:`~.ground_roots` should be used instead. + + >>> from sympy import roots, ground_roots + >>> p = x**2 - 3*x*y + 2*y**2 + >>> roots(p, x) + {y: 1, 2*y: 1} + >>> ground_roots(p, x) + {y: 1, 2*y: 1} + + Parameters + ========== + + f : :class:`~.Expr` or :class:`~.Poly` + A univariate polynomial with rational (or ``Float``) coefficients. + multiple : ``bool`` (default ``True``). + Whether to return a ``list`` of roots or a list of root/multiplicity + pairs. + radicals : ``bool`` (default ``True``) + Use simple radical formulae rather than :py:class:`~.ComplexRootOf` for + some irrational roots. + extension: ``bool`` (default ``False``) + Whether to construct an algebraic extension domain before computing + the roots. Setting to ``True`` is necessary for finding roots of a + polynomial with (irrational) algebraic coefficients but can be slow. + + Returns + ======= + + A list of :class:`~.Expr` (usually :class:`~.ComplexRootOf`) representing + the real roots is returned. The roots are arranged in increasing order and + are repeated according to their multiplicities as roots of ``f``. + + If ``multiple=False`` is passed then a list of root/multiplicity pairs is + returned instead. + + If ``radicals=False`` is passed then all roots will be represented as + either rational numbers or :class:`~.ComplexRootOf`. + + See also + ======== + + Poly.real_roots: + The underlying :class:`Poly` method used by :func:`real_roots`. + rootof: + Compute a single numbered root of a univariate polynomial. + all_roots: + Compute all real and non-real roots using :func:`~.rootof`. + ground_roots: + Compute some roots in the ground domain by factorisation. + nroots: + Compute all roots using approximate numerical techniques. + sympy.polys.polyroots.roots: + Compute symbolic expressions for roots using radical formulae. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Casus_irreducibilis + """ + try: + if isinstance(f, Poly): + if extension and not f.domain.is_AlgebraicField: + F = Poly(f.expr, extension=True) + else: + F = f + else: + if extension: + F = Poly(f, extension=True) + else: + F = Poly(f, greedy=False) + + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except GeneratorsNeeded: + raise PolynomialError( + "Cannot compute real roots of %s, not a polynomial" % f) + + return F.real_roots(multiple=multiple, radicals=radicals) + + +@public +def nroots(f, n=15, maxsteps=50, cleanup=True): + """ + Compute numerical approximations of roots of ``f``. + + Examples + ======== + + >>> from sympy import nroots + >>> from sympy.abc import x + + >>> nroots(x**2 - 3, n=15) + [-1.73205080756888, 1.73205080756888] + >>> nroots(x**2 - 3, n=30) + [-1.73205080756887729352744634151, 1.73205080756887729352744634151] + + """ + try: + F = Poly(f, greedy=False) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except GeneratorsNeeded: + raise PolynomialError( + "Cannot compute numerical roots of %s, not a polynomial" % f) + + return F.nroots(n=n, maxsteps=maxsteps, cleanup=cleanup) + + +@public +def ground_roots(f, *gens, **args): + """ + Compute roots of ``f`` by factorization in the ground domain. + + Examples + ======== + + >>> from sympy import ground_roots + >>> from sympy.abc import x + + >>> ground_roots(x**6 - 4*x**4 + 4*x**3 - x**2) + {0: 2, 1: 2} + + """ + options.allowed_flags(args, []) + + try: + F, opt = poly_from_expr(f, *gens, **args) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except PolificationFailed as exc: + raise ComputationFailed('ground_roots', 1, exc) + + return F.ground_roots() + + +@public +def nth_power_roots_poly(f, n, *gens, **args): + """ + Construct a polynomial with n-th powers of roots of ``f``. + + Examples + ======== + + >>> from sympy import nth_power_roots_poly, factor, roots + >>> from sympy.abc import x + + >>> f = x**4 - x**2 + 1 + >>> g = factor(nth_power_roots_poly(f, 2)) + + >>> g + (x**2 - x + 1)**2 + + >>> R_f = [ (r**2).expand() for r in roots(f) ] + >>> R_g = roots(g).keys() + + >>> set(R_f) == set(R_g) + True + + """ + options.allowed_flags(args, []) + + try: + F, opt = poly_from_expr(f, *gens, **args) + if not isinstance(f, Poly) and not F.gen.is_Symbol: + # root of sin(x) + 1 is -1 but when someone + # passes an Expr instead of Poly they may not expect + # that the generator will be sin(x), not x + raise PolynomialError("generator must be a Symbol") + except PolificationFailed as exc: + raise ComputationFailed('nth_power_roots_poly', 1, exc) + + result = F.nth_power_roots_poly(n) + + if not opt.polys: + return result.as_expr() + else: + return result + + +@public +def cancel(f, *gens, _signsimp=True, **args): + """ + Cancel common factors in a rational function ``f``. + + Examples + ======== + + >>> from sympy import cancel, sqrt, Symbol, together + >>> from sympy.abc import x + >>> A = Symbol('A', commutative=False) + + >>> cancel((2*x**2 - 2)/(x**2 - 2*x + 1)) + (2*x + 2)/(x - 1) + >>> cancel((sqrt(3) + sqrt(15)*A)/(sqrt(2) + sqrt(10)*A)) + sqrt(6)/2 + + Note: due to automatic distribution of Rationals, a sum divided by an integer + will appear as a sum. To recover a rational form use `together` on the result: + + >>> cancel(x/2 + 1) + x/2 + 1 + >>> together(_) + (x + 2)/2 + """ + from sympy.simplify.simplify import signsimp + from sympy.polys.rings import sring + options.allowed_flags(args, ['polys']) + + f = sympify(f) + if _signsimp: + f = signsimp(f) + opt = {} + if 'polys' in args: + opt['polys'] = args['polys'] + + if not isinstance(f, Tuple): + if f.is_Number or isinstance(f, Relational) or not isinstance(f, Expr): + return f + f = factor_terms(f, radical=True) + p, q = f.as_numer_denom() + + elif len(f) == 2: + p, q = f + if isinstance(p, Poly) and isinstance(q, Poly): + opt['gens'] = p.gens + opt['domain'] = p.domain + opt['polys'] = opt.get('polys', True) + p, q = p.as_expr(), q.as_expr() + else: + raise ValueError('unexpected argument: %s' % f) + + from sympy.functions.elementary.piecewise import Piecewise + try: + if f.has(Piecewise): + raise PolynomialError() + R, (F, G) = sring((p, q), *gens, **args) + if not R.ngens: + if not isinstance(f, Tuple): + return f.expand() + else: + return S.One, p, q + except PolynomialError as msg: + if f.is_commutative and not f.has(Piecewise): + raise PolynomialError(msg) + # Handling of noncommutative and/or piecewise expressions + if f.is_Add or f.is_Mul: + c, nc = sift(f.args, lambda x: + x.is_commutative is True and not x.has(Piecewise), + binary=True) + nc = [cancel(i) for i in nc] + return f.func(cancel(f.func(*c)), *nc) + else: + reps = [] + pot = preorder_traversal(f) + next(pot) + for e in pot: + if isinstance(e, BooleanAtom) or not isinstance(e, Expr): + continue + try: + reps.append((e, cancel(e))) + pot.skip() # this was handled successfully + except NotImplementedError: + pass + return f.xreplace(dict(reps)) + + c, (P, Q) = 1, F.cancel(G) + if opt.get('polys', False) and 'gens' not in opt: + opt['gens'] = R.symbols + + if not isinstance(f, Tuple): + return c*(P.as_expr()/Q.as_expr()) + else: + P, Q = P.as_expr(), Q.as_expr() + if not opt.get('polys', False): + return c, P, Q + else: + return c, Poly(P, *gens, **opt), Poly(Q, *gens, **opt) + + +@public +def reduced(f, G, *gens, **args): + """ + Reduces a polynomial ``f`` modulo a set of polynomials ``G``. + + Given a polynomial ``f`` and a set of polynomials ``G = (g_1, ..., g_n)``, + computes a set of quotients ``q = (q_1, ..., q_n)`` and the remainder ``r`` + such that ``f = q_1*g_1 + ... + q_n*g_n + r``, where ``r`` vanishes or ``r`` + is a completely reduced polynomial with respect to ``G``. + + Examples + ======== + + >>> from sympy import reduced + >>> from sympy.abc import x, y + + >>> reduced(2*x**4 + y**2 - x**2 + y**3, [x**3 - x, y**3 - y]) + ([2*x, 1], x**2 + y**2 + y) + + """ + options.allowed_flags(args, ['polys', 'auto']) + + try: + polys, opt = parallel_poly_from_expr([f] + list(G), *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('reduced', 0, exc) + + domain = opt.domain + retract = False + + if opt.auto and domain.is_Ring and not domain.is_Field: + opt = opt.clone({"domain": domain.get_field()}) + retract = True + + from sympy.polys.rings import xring + _ring, _ = xring(opt.gens, opt.domain, opt.order) + + for i, poly in enumerate(polys): + poly = poly.set_domain(opt.domain).rep.to_dict() + polys[i] = _ring.from_dict(poly) + + Q, r = polys[0].div(polys[1:]) + + Q = [Poly._from_dict(dict(q), opt) for q in Q] + r = Poly._from_dict(dict(r), opt) + + if retract: + try: + _Q, _r = [q.to_ring() for q in Q], r.to_ring() + except CoercionFailed: + pass + else: + Q, r = _Q, _r + + if not opt.polys: + return [q.as_expr() for q in Q], r.as_expr() + else: + return Q, r + + +@public +def groebner(F, *gens, **args): + """ + Computes the reduced Groebner basis for a set of polynomials. + + Use the ``order`` argument to set the monomial ordering that will be + used to compute the basis. Allowed orders are ``lex``, ``grlex`` and + ``grevlex``. If no order is specified, it defaults to ``lex``. + + For more information on Groebner bases, see the references and the docstring + of :func:`~.solve_poly_system`. + + Examples + ======== + + Example taken from [1]. + + >>> from sympy import groebner + >>> from sympy.abc import x, y + + >>> F = [x*y - 2*y, 2*y**2 - x**2] + + >>> groebner(F, x, y, order='lex') + GroebnerBasis([x**2 - 2*y**2, x*y - 2*y, y**3 - 2*y], x, y, + domain='ZZ', order='lex') + >>> groebner(F, x, y, order='grlex') + GroebnerBasis([y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y], x, y, + domain='ZZ', order='grlex') + >>> groebner(F, x, y, order='grevlex') + GroebnerBasis([y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y], x, y, + domain='ZZ', order='grevlex') + + By default, an improved implementation of the Buchberger algorithm is + used. Optionally, an implementation of the F5B algorithm can be used. The + algorithm can be set using the ``method`` flag or with the + :func:`sympy.polys.polyconfig.setup` function. + + >>> F = [x**2 - x - 1, (2*x - 1) * y - (x**10 - (1 - x)**10)] + + >>> groebner(F, x, y, method='buchberger') + GroebnerBasis([x**2 - x - 1, y - 55], x, y, domain='ZZ', order='lex') + >>> groebner(F, x, y, method='f5b') + GroebnerBasis([x**2 - x - 1, y - 55], x, y, domain='ZZ', order='lex') + + References + ========== + + 1. [Buchberger01]_ + 2. [Cox97]_ + + """ + return GroebnerBasis(F, *gens, **args) + + +@public +def is_zero_dimensional(F, *gens, **args): + """ + Checks if the ideal generated by a Groebner basis is zero-dimensional. + + The algorithm checks if the set of monomials not divisible by the + leading monomial of any element of ``F`` is bounded. + + References + ========== + + David A. Cox, John B. Little, Donal O'Shea. Ideals, Varieties and + Algorithms, 3rd edition, p. 230 + + """ + return GroebnerBasis(F, *gens, **args).is_zero_dimensional + + +@public +class GroebnerBasis(Basic): + """Represents a reduced Groebner basis. """ + + def __new__(cls, F, *gens, **args): + """Compute a reduced Groebner basis for a system of polynomials. """ + options.allowed_flags(args, ['polys', 'method']) + + try: + polys, opt = parallel_poly_from_expr(F, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('groebner', len(F), exc) + + from sympy.polys.rings import PolyRing + ring = PolyRing(opt.gens, opt.domain, opt.order) + + polys = [ring.from_dict(poly.rep.to_dict()) for poly in polys if poly] + + G = _groebner(polys, ring, method=opt.method) + G = [Poly._from_dict(g, opt) for g in G] + + return cls._new(G, opt) + + @classmethod + def _new(cls, basis, options): + obj = Basic.__new__(cls) + + obj._basis = tuple(basis) + obj._options = options + + return obj + + @property + def args(self): + basis = (p.as_expr() for p in self._basis) + return (Tuple(*basis), Tuple(*self._options.gens)) + + @property + def exprs(self): + return [poly.as_expr() for poly in self._basis] + + @property + def polys(self): + return list(self._basis) + + @property + def gens(self): + return self._options.gens + + @property + def domain(self): + return self._options.domain + + @property + def order(self): + return self._options.order + + def __len__(self): + return len(self._basis) + + def __iter__(self): + if self._options.polys: + return iter(self.polys) + else: + return iter(self.exprs) + + def __getitem__(self, item): + if self._options.polys: + basis = self.polys + else: + basis = self.exprs + + return basis[item] + + def __hash__(self): + return hash((self._basis, tuple(self._options.items()))) + + def __eq__(self, other): + if isinstance(other, self.__class__): + return self._basis == other._basis and self._options == other._options + elif iterable(other): + return self.polys == list(other) or self.exprs == list(other) + else: + return False + + def __ne__(self, other): + return not self == other + + @property + def is_zero_dimensional(self): + """ + Checks if the ideal generated by a Groebner basis is zero-dimensional. + + The algorithm checks if the set of monomials not divisible by the + leading monomial of any element of ``F`` is bounded. + + References + ========== + + David A. Cox, John B. Little, Donal O'Shea. Ideals, Varieties and + Algorithms, 3rd edition, p. 230 + + """ + def single_var(monomial): + return sum(map(bool, monomial)) == 1 + + exponents = Monomial([0]*len(self.gens)) + order = self._options.order + + for poly in self.polys: + monomial = poly.LM(order=order) + + if single_var(monomial): + exponents *= monomial + + # If any element of the exponents vector is zero, then there's + # a variable for which there's no degree bound and the ideal + # generated by this Groebner basis isn't zero-dimensional. + return all(exponents) + + def fglm(self, order): + """ + Convert a Groebner basis from one ordering to another. + + The FGLM algorithm converts reduced Groebner bases of zero-dimensional + ideals from one ordering to another. This method is often used when it + is infeasible to compute a Groebner basis with respect to a particular + ordering directly. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import groebner + + >>> F = [x**2 - 3*y - x + 1, y**2 - 2*x + y - 1] + >>> G = groebner(F, x, y, order='grlex') + + >>> list(G.fglm('lex')) + [2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7] + >>> list(groebner(F, x, y, order='lex')) + [2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7] + + References + ========== + + .. [1] J.C. Faugere, P. Gianni, D. Lazard, T. Mora (1994). Efficient + Computation of Zero-dimensional Groebner Bases by Change of + Ordering + + """ + opt = self._options + + src_order = opt.order + dst_order = monomial_key(order) + + if src_order == dst_order: + return self + + if not self.is_zero_dimensional: + raise NotImplementedError("Cannot convert Groebner bases of ideals with positive dimension") + + polys = list(self._basis) + domain = opt.domain + + opt = opt.clone({ + "domain": domain.get_field(), + "order": dst_order, + }) + + from sympy.polys.rings import xring + _ring, _ = xring(opt.gens, opt.domain, src_order) + + for i, poly in enumerate(polys): + poly = poly.set_domain(opt.domain).rep.to_dict() + polys[i] = _ring.from_dict(poly) + + G = matrix_fglm(polys, _ring, dst_order) + G = [Poly._from_dict(dict(g), opt) for g in G] + + if not domain.is_Field: + G = [g.clear_denoms(convert=True)[1] for g in G] + opt.domain = domain + + return self._new(G, opt) + + def reduce(self, expr, auto=True): + """ + Reduces a polynomial modulo a Groebner basis. + + Given a polynomial ``f`` and a set of polynomials ``G = (g_1, ..., g_n)``, + computes a set of quotients ``q = (q_1, ..., q_n)`` and the remainder ``r`` + such that ``f = q_1*f_1 + ... + q_n*f_n + r``, where ``r`` vanishes or ``r`` + is a completely reduced polynomial with respect to ``G``. + + Examples + ======== + + >>> from sympy import groebner, expand, Poly + >>> from sympy.abc import x, y + + >>> f = 2*x**4 - x**2 + y**3 + y**2 + >>> G = groebner([x**3 - x, y**3 - y]) + + >>> G.reduce(f) + ([2*x, 1], x**2 + y**2 + y) + >>> Q, r = _ + + >>> expand(sum(q*g for q, g in zip(Q, G)) + r) + 2*x**4 - x**2 + y**3 + y**2 + >>> _ == f + True + + # Using Poly input + >>> f_poly = Poly(f, x, y) + >>> G = groebner([Poly(x**3 - x), Poly(y**3 - y)]) + + >>> G.reduce(f_poly) + ([Poly(2*x, x, y, domain='ZZ'), Poly(1, x, y, domain='ZZ')], Poly(x**2 + y**2 + y, x, y, domain='ZZ')) + + """ + if isinstance(expr, Poly): + + if expr.gens != self._options.gens: + raise ValueError("Polynomial generators don't match Groebner basis generators") + poly = expr.set_domain(self._options.domain) + else: + + poly = Poly._from_expr(expr, self._options) + + polys = [poly] + list(self._basis) + + opt = self._options + domain = opt.domain + + retract = False + + if auto and domain.is_Ring and not domain.is_Field: + opt = opt.clone({"domain": domain.get_field()}) + retract = True + + from sympy.polys.rings import xring + _ring, _ = xring(opt.gens, opt.domain, opt.order) + + for i, poly in enumerate(polys): + poly = poly.set_domain(opt.domain).rep.to_dict() + polys[i] = _ring.from_dict(poly) + + Q, r = polys[0].div(polys[1:]) + + Q = [Poly._from_dict(dict(q), opt) for q in Q] + r = Poly._from_dict(dict(r), opt) + + if retract: + try: + _Q, _r = [q.to_ring() for q in Q], r.to_ring() + except CoercionFailed: + pass + else: + Q, r = _Q, _r + + if not opt.polys: + return [q.as_expr() for q in Q], r.as_expr() + else: + return Q, r + + def contains(self, poly): + """ + Check if ``poly`` belongs the ideal generated by ``self``. + + Examples + ======== + + >>> from sympy import groebner + >>> from sympy.abc import x, y + + >>> f = 2*x**3 + y**3 + 3*y + >>> G = groebner([x**2 + y**2 - 1, x*y - 2]) + + >>> G.contains(f) + True + >>> G.contains(f + 1) + False + + """ + return self.reduce(poly)[1] == 0 + + +@public +def poly(expr, *gens, **args): + """ + Efficiently transform an expression into a polynomial. + + Examples + ======== + + >>> from sympy import poly + >>> from sympy.abc import x + + >>> poly(x*(x**2 + x - 1)**2) + Poly(x**5 + 2*x**4 - x**3 - 2*x**2 + x, x, domain='ZZ') + + """ + options.allowed_flags(args, []) + + def _poly(expr, opt): + terms, poly_terms = [], [] + + for term in Add.make_args(expr): + factors, poly_factors = [], [] + + for factor in Mul.make_args(term): + if factor.is_Add: + poly_factors.append(_poly(factor, opt)) + elif factor.is_Pow and factor.base.is_Add and \ + factor.exp.is_Integer and factor.exp >= 0: + poly_factors.append( + _poly(factor.base, opt).pow(factor.exp)) + else: + factors.append(factor) + + if not poly_factors: + terms.append(term) + else: + product = poly_factors[0] + + for factor in poly_factors[1:]: + product = product.mul(factor) + + if factors: + factor = Mul(*factors) + + if factor.is_Number: + product *= factor + else: + product = product.mul(Poly._from_expr(factor, opt)) + + poly_terms.append(product) + + if not poly_terms: + result = Poly._from_expr(expr, opt) + else: + result = poly_terms[0] + + for term in poly_terms[1:]: + result = result.add(term) + + if terms: + term = Add(*terms) + + if term.is_Number: + result += term + else: + result = result.add(Poly._from_expr(term, opt)) + + return result.reorder(*opt.get('gens', ()), **args) + + expr = sympify(expr) + + if expr.is_Poly: + return Poly(expr, *gens, **args) + + if 'expand' not in args: + args['expand'] = False + + opt = options.build_options(gens, args) + + return _poly(expr, opt) + + +def named_poly(n, f, K, name, x, polys): + r"""Common interface to the low-level polynomial generating functions + in orthopolys and appellseqs. + + Parameters + ========== + + n : int + Index of the polynomial, which may or may not equal its degree. + f : callable + Low-level generating function to use. + K : Domain or None + Domain in which to perform the computations. If None, use the smallest + field containing the rationals and the extra parameters of x (see below). + name : str + Name of an arbitrary individual polynomial in the sequence generated + by f, only used in the error message for invalid n. + x : seq + The first element of this argument is the main variable of all + polynomials in this sequence. Any further elements are extra + parameters required by f. + polys : bool, optional + If True, return a Poly, otherwise (default) return an expression. + """ + if n < 0: + raise ValueError("Cannot generate %s of index %s" % (name, n)) + head, tail = x[0], x[1:] + if K is None: + K, tail = construct_domain(tail, field=True) + poly = DMP(f(int(n), *tail, K), K) + if head is None: + poly = PurePoly.new(poly, Dummy('x')) + else: + poly = Poly.new(poly, head) + return poly if polys else poly.as_expr() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyutils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyutils.py new file mode 100644 index 0000000000000000000000000000000000000000..6a2019d3b195891d84ce8e0b368f6bdc5f45d4b3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/polyutils.py @@ -0,0 +1,584 @@ +"""Useful utilities for higher level polynomial classes. """ + +from __future__ import annotations + +from sympy.external.gmpy import GROUND_TYPES + +from sympy.core import (S, Add, Mul, Pow, Eq, Expr, + expand_mul, expand_multinomial) +from sympy.core.exprtools import decompose_power, decompose_power_rat +from sympy.core.numbers import _illegal +from sympy.polys.polyerrors import PolynomialError, GeneratorsError +from sympy.polys.polyoptions import build_options + +import re + + +_gens_order = { + 'a': 301, 'b': 302, 'c': 303, 'd': 304, + 'e': 305, 'f': 306, 'g': 307, 'h': 308, + 'i': 309, 'j': 310, 'k': 311, 'l': 312, + 'm': 313, 'n': 314, 'o': 315, 'p': 216, + 'q': 217, 'r': 218, 's': 219, 't': 220, + 'u': 221, 'v': 222, 'w': 223, 'x': 124, + 'y': 125, 'z': 126, +} + +_max_order = 1000 +_re_gen = re.compile(r"^(.*?)(\d*)$", re.MULTILINE) + + +def _nsort(roots, separated=False): + """Sort the numerical roots putting the real roots first, then sorting + according to real and imaginary parts. If ``separated`` is True, then + the real and imaginary roots will be returned in two lists, respectively. + + This routine tries to avoid issue 6137 by separating the roots into real + and imaginary parts before evaluation. In addition, the sorting will raise + an error if any computation cannot be done with precision. + """ + if not all(r.is_number for r in roots): + raise NotImplementedError + if not len(roots): + return [] if not separated else ([], []) + # see issue 6137: + # get the real part of the evaluated real and imaginary parts of each root + key = [[i.n(2).as_real_imag()[0] for i in r.as_real_imag()] for r in roots] + # make sure the parts were computed with precision + if len(roots) > 1 and any(i._prec == 1 for k in key for i in k): + raise NotImplementedError("could not compute root with precision") + # insert a key to indicate if the root has an imaginary part + key = [(1 if i else 0, r, i) for r, i in key] + key = sorted(zip(key, roots)) + # return the real and imaginary roots separately if desired + if separated: + r = [] + i = [] + for (im, _, _), v in key: + if im: + i.append(v) + else: + r.append(v) + return r, i + _, roots = zip(*key) + return list(roots) + + +def _sort_gens(gens, **args): + """Sort generators in a reasonably intelligent way. """ + opt = build_options(args) + + gens_order, wrt = {}, None + + if opt is not None: + gens_order, wrt = {}, opt.wrt + + for i, gen in enumerate(opt.sort): + gens_order[gen] = i + 1 + + def order_key(gen): + gen = str(gen) + + if wrt is not None: + try: + return (-len(wrt) + wrt.index(gen), gen, 0) + except ValueError: + pass + + name, index = _re_gen.match(gen).groups() + + if index: + index = int(index) + else: + index = 0 + + try: + return ( gens_order[name], name, index) + except KeyError: + pass + + try: + return (_gens_order[name], name, index) + except KeyError: + pass + + return (_max_order, name, index) + + try: + gens = sorted(gens, key=order_key) + except TypeError: # pragma: no cover + pass + + return tuple(gens) + + +def _unify_gens(f_gens, g_gens): + """Unify generators in a reasonably intelligent way. """ + f_gens = list(f_gens) + g_gens = list(g_gens) + + if f_gens == g_gens: + return tuple(f_gens) + + gens, common, k = [], [], 0 + + for gen in f_gens: + if gen in g_gens: + common.append(gen) + + for i, gen in enumerate(g_gens): + if gen in common: + g_gens[i], k = common[k], k + 1 + + for gen in common: + i = f_gens.index(gen) + + gens.extend(f_gens[:i]) + f_gens = f_gens[i + 1:] + + i = g_gens.index(gen) + + gens.extend(g_gens[:i]) + g_gens = g_gens[i + 1:] + + gens.append(gen) + + gens.extend(f_gens) + gens.extend(g_gens) + + return tuple(gens) + + +def _analyze_gens(gens): + """Support for passing generators as `*gens` and `[gens]`. """ + if len(gens) == 1 and hasattr(gens[0], '__iter__'): + return tuple(gens[0]) + else: + return tuple(gens) + + +def _sort_factors(factors, **args): + """Sort low-level factors in increasing 'complexity' order. """ + + # XXX: GF(p) does not support comparisons so we need a key function to sort + # the factors if python-flint is being used. A better solution might be to + # add a sort key method to each domain. + def order_key(factor): + if isinstance(factor, _GF_types): + return int(factor) + elif isinstance(factor, list): + return [order_key(f) for f in factor] + else: + return factor + + def order_if_multiple_key(factor): + (f, n) = factor + return (len(f), n, order_key(f)) + + def order_no_multiple_key(f): + return (len(f), order_key(f)) + + if args.get('multiple', True): + return sorted(factors, key=order_if_multiple_key) + else: + return sorted(factors, key=order_no_multiple_key) + + +illegal_types = [type(obj) for obj in _illegal] +finf = [float(i) for i in _illegal[1:3]] + + +def _not_a_coeff(expr): + """Do not treat NaN and infinities as valid polynomial coefficients. """ + if type(expr) in illegal_types or expr in finf: + return True + if isinstance(expr, float) and float(expr) != expr: + return True # nan + return # could be + + +def _parallel_dict_from_expr_if_gens(exprs, opt): + """Transform expressions into a multinomial form given generators. """ + k, indices = len(opt.gens), {} + + for i, g in enumerate(opt.gens): + indices[g] = i + + polys = [] + + for expr in exprs: + poly = {} + + if expr.is_Equality: + expr = expr.lhs - expr.rhs + + for term in Add.make_args(expr): + coeff, monom = [], [0]*k + + for factor in Mul.make_args(term): + if not _not_a_coeff(factor) and factor.is_Number: + coeff.append(factor) + else: + try: + if opt.series is False: + base, exp = decompose_power(factor) + + if exp < 0: + exp, base = -exp, Pow(base, -S.One) + else: + base, exp = decompose_power_rat(factor) + + monom[indices[base]] = exp + except KeyError: + if not factor.has_free(*opt.gens): + coeff.append(factor) + else: + raise PolynomialError("%s contains an element of " + "the set of generators." % factor) + + monom = tuple(monom) + + if monom in poly: + poly[monom] += Mul(*coeff) + else: + poly[monom] = Mul(*coeff) + + polys.append(poly) + + return polys, opt.gens + + +def _parallel_dict_from_expr_no_gens(exprs, opt): + """Transform expressions into a multinomial form and figure out generators. """ + if opt.domain is not None: + def _is_coeff(factor): + return factor in opt.domain + elif opt.extension is True: + def _is_coeff(factor): + return factor.is_algebraic + elif opt.greedy is not False: + def _is_coeff(factor): + return factor is S.ImaginaryUnit + else: + def _is_coeff(factor): + return factor.is_number + + gens, reprs = set(), [] + + for expr in exprs: + terms = [] + + if expr.is_Equality: + expr = expr.lhs - expr.rhs + + for term in Add.make_args(expr): + coeff, elements = [], {} + + for factor in Mul.make_args(term): + if not _not_a_coeff(factor) and (factor.is_Number or _is_coeff(factor)): + coeff.append(factor) + else: + if opt.series is False: + base, exp = decompose_power(factor) + + if exp < 0: + exp, base = -exp, Pow(base, -S.One) + else: + base, exp = decompose_power_rat(factor) + + elements[base] = elements.setdefault(base, 0) + exp + gens.add(base) + + terms.append((coeff, elements)) + + reprs.append(terms) + + gens = _sort_gens(gens, opt=opt) + k, indices = len(gens), {} + + for i, g in enumerate(gens): + indices[g] = i + + polys = [] + + for terms in reprs: + poly = {} + + for coeff, term in terms: + monom = [0]*k + + for base, exp in term.items(): + monom[indices[base]] = exp + + monom = tuple(monom) + + if monom in poly: + poly[monom] += Mul(*coeff) + else: + poly[monom] = Mul(*coeff) + + polys.append(poly) + + return polys, tuple(gens) + + +def _dict_from_expr_if_gens(expr, opt): + """Transform an expression into a multinomial form given generators. """ + (poly,), gens = _parallel_dict_from_expr_if_gens((expr,), opt) + return poly, gens + + +def _dict_from_expr_no_gens(expr, opt): + """Transform an expression into a multinomial form and figure out generators. """ + (poly,), gens = _parallel_dict_from_expr_no_gens((expr,), opt) + return poly, gens + + +def parallel_dict_from_expr(exprs, **args): + """Transform expressions into a multinomial form. """ + reps, opt = _parallel_dict_from_expr(exprs, build_options(args)) + return reps, opt.gens + + +def _parallel_dict_from_expr(exprs, opt): + """Transform expressions into a multinomial form. """ + if opt.expand is not False: + exprs = [ expr.expand() for expr in exprs ] + + if any(expr.is_commutative is False for expr in exprs): + raise PolynomialError('non-commutative expressions are not supported') + + if opt.gens: + reps, gens = _parallel_dict_from_expr_if_gens(exprs, opt) + else: + reps, gens = _parallel_dict_from_expr_no_gens(exprs, opt) + + return reps, opt.clone({'gens': gens}) + + +def dict_from_expr(expr, **args): + """Transform an expression into a multinomial form. """ + rep, opt = _dict_from_expr(expr, build_options(args)) + return rep, opt.gens + + +def _dict_from_expr(expr, opt): + """Transform an expression into a multinomial form. """ + if expr.is_commutative is False: + raise PolynomialError('non-commutative expressions are not supported') + + def _is_expandable_pow(expr): + return (expr.is_Pow and expr.exp.is_positive and expr.exp.is_Integer + and expr.base.is_Add) + + if opt.expand is not False: + if not isinstance(expr, (Expr, Eq)): + raise PolynomialError('expression must be of type Expr') + expr = expr.expand() + # TODO: Integrate this into expand() itself + while any(_is_expandable_pow(i) or i.is_Mul and + any(_is_expandable_pow(j) for j in i.args) for i in + Add.make_args(expr)): + + expr = expand_multinomial(expr) + while any(i.is_Mul and any(j.is_Add for j in i.args) for i in Add.make_args(expr)): + expr = expand_mul(expr) + + if opt.gens: + rep, gens = _dict_from_expr_if_gens(expr, opt) + else: + rep, gens = _dict_from_expr_no_gens(expr, opt) + + return rep, opt.clone({'gens': gens}) + + +def expr_from_dict(rep, *gens): + """Convert a multinomial form into an expression. """ + result = [] + + for monom, coeff in rep.items(): + term = [coeff] + for g, m in zip(gens, monom): + if m: + term.append(Pow(g, m)) + + result.append(Mul(*term)) + + return Add(*result) + +parallel_dict_from_basic = parallel_dict_from_expr +dict_from_basic = dict_from_expr +basic_from_dict = expr_from_dict + + +def _dict_reorder(rep, gens, new_gens): + """Reorder levels using dict representation. """ + gens = list(gens) + + monoms = rep.keys() + coeffs = rep.values() + + new_monoms = [ [] for _ in range(len(rep)) ] + used_indices = set() + + for gen in new_gens: + try: + j = gens.index(gen) + used_indices.add(j) + + for M, new_M in zip(monoms, new_monoms): + new_M.append(M[j]) + except ValueError: + for new_M in new_monoms: + new_M.append(0) + + for i, _ in enumerate(gens): + if i not in used_indices: + for monom in monoms: + if monom[i]: + raise GeneratorsError("unable to drop generators") + + return map(tuple, new_monoms), coeffs + + +class PicklableWithSlots: + """ + Mixin class that allows to pickle objects with ``__slots__``. + + Examples + ======== + + First define a class that mixes :class:`PicklableWithSlots` in:: + + >>> from sympy.polys.polyutils import PicklableWithSlots + >>> class Some(PicklableWithSlots): + ... __slots__ = ('foo', 'bar') + ... + ... def __init__(self, foo, bar): + ... self.foo = foo + ... self.bar = bar + + To make :mod:`pickle` happy in doctest we have to use these hacks:: + + >>> import builtins + >>> builtins.Some = Some + >>> from sympy.polys import polyutils + >>> polyutils.Some = Some + + Next lets see if we can create an instance, pickle it and unpickle:: + + >>> some = Some('abc', 10) + >>> some.foo, some.bar + ('abc', 10) + + >>> from pickle import dumps, loads + >>> some2 = loads(dumps(some)) + + >>> some2.foo, some2.bar + ('abc', 10) + + """ + + __slots__ = () + + def __getstate__(self, cls=None): + if cls is None: + # This is the case for the instance that gets pickled + cls = self.__class__ + + d = {} + + # Get all data that should be stored from super classes + for c in cls.__bases__: + # XXX: Python 3.11 defines object.__getstate__ and it does not + # accept any arguments so we need to make sure not to call it with + # an argument here. To be compatible with Python < 3.11 we need to + # be careful not to assume that c or object has a __getstate__ + # method though. + getstate = getattr(c, "__getstate__", None) + objstate = getattr(object, "__getstate__", None) + if getstate is not None and getstate is not objstate: + d.update(getstate(self, c)) + + # Get all information that should be stored from cls and return the dict + for name in cls.__slots__: + if hasattr(self, name): + d[name] = getattr(self, name) + + return d + + def __setstate__(self, d): + # All values that were pickled are now assigned to a fresh instance + for name, value in d.items(): + setattr(self, name, value) + + +class IntegerPowerable: + r""" + Mixin class for classes that define a `__mul__` method, and want to be + raised to integer powers in the natural way that follows. Implements + powering via binary expansion, for efficiency. + + By default, only integer powers $\geq 2$ are supported. To support the + first, zeroth, or negative powers, override the corresponding methods, + `_first_power`, `_zeroth_power`, `_negative_power`, below. + """ + + def __pow__(self, e, modulo=None): + if e < 2: + try: + if e == 1: + return self._first_power() + elif e == 0: + return self._zeroth_power() + else: + return self._negative_power(e, modulo=modulo) + except NotImplementedError: + return NotImplemented + else: + bits = [int(d) for d in reversed(bin(e)[2:])] + n = len(bits) + p = self + first = True + for i in range(n): + if bits[i]: + if first: + r = p + first = False + else: + r *= p + if modulo is not None: + r %= modulo + if i < n - 1: + p *= p + if modulo is not None: + p %= modulo + return r + + def _negative_power(self, e, modulo=None): + """ + Compute inverse of self, then raise that to the abs(e) power. + For example, if the class has an `inv()` method, + return self.inv() ** abs(e) % modulo + """ + raise NotImplementedError + + def _zeroth_power(self): + """Return unity element of algebraic struct to which self belongs.""" + raise NotImplementedError + + def _first_power(self): + """Return a copy of self.""" + raise NotImplementedError + + +_GF_types: tuple[type, ...] + + +if GROUND_TYPES == 'flint': + import flint + _GF_types = (flint.nmod, flint.fmpz_mod) +else: + from sympy.polys.domains.modularinteger import ModularInteger + flint = None + _GF_types = (ModularInteger,) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/puiseux.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/puiseux.py new file mode 100644 index 0000000000000000000000000000000000000000..446dc9c1a5e0d873cdf23da37d2c2430ba0bac6e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/puiseux.py @@ -0,0 +1,795 @@ +""" +Puiseux rings. These are used by the ring_series module to represented +truncated Puiseux series. Elements of a Puiseux ring are like polynomials +except that the exponents can be negative or rational rather than just +non-negative integers. +""" + +# Previously the ring_series module used PolyElement to represent Puiseux +# series. This is problematic because it means that PolyElement has to support +# negative and non-integer exponents which most polynomial representations do +# not support. This module provides an implementation of a ring for Puiseux +# series that can be used by ring_series without breaking the basic invariants +# of polynomial rings. +# +# Ideally there would be more of a proper series type that can keep track of +# not just the leading terms of a truncated series but also the precision +# of the series. For now the rings here are just introduced to keep the +# interface that ring_series was using before. + +from __future__ import annotations + +from sympy.polys.domains import QQ +from sympy.polys.rings import PolyRing, PolyElement +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.external.gmpy import gcd, lcm + + +from typing import TYPE_CHECKING + + +if TYPE_CHECKING: + from typing import Any, Unpack + from sympy.core.expr import Expr + from sympy.polys.domains import Domain + from collections.abc import Iterable, Iterator + + +def puiseux_ring( + symbols: str | list[Expr], domain: Domain +) -> tuple[PuiseuxRing, Unpack[tuple[PuiseuxPoly, ...]]]: + """Construct a Puiseux ring. + + This function constructs a Puiseux ring with the given symbols and domain. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x y', QQ) + >>> R + PuiseuxRing((x, y), QQ) + >>> p = 5*x**QQ(1,2) + 7/y + >>> p + 7*y**(-1) + 5*x**(1/2) + """ + ring = PuiseuxRing(symbols, domain) + return (ring,) + ring.gens # type: ignore + + +class PuiseuxRing: + """Ring of Puiseux polynomials. + + A Puiseux polynomial is a truncated Puiseux series. The exponents of the + monomials can be negative or rational numbers. This ring is used by the + ring_series module: + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_exp, rs_nth_root + >>> ring, x, y = puiseux_ring('x y', QQ) + >>> f = x**2 + y**3 + >>> f + y**3 + x**2 + >>> f.diff(x) + 2*x + >>> rs_exp(x, x, 5) + 1 + x + 1/2*x**2 + 1/6*x**3 + 1/24*x**4 + + Importantly the Puiseux ring can represent truncated series with negative + and fractional exponents: + + >>> f = 1/x + 1/y**2 + >>> f + x**(-1) + y**(-2) + >>> f.diff(x) + -1*x**(-2) + + >>> rs_nth_root(8*x + x**2 + x**3, 3, x, 5) + 2*x**(1/3) + 1/12*x**(4/3) + 23/288*x**(7/3) + -139/20736*x**(10/3) + + See Also + ======== + + sympy.polys.ring_series.rs_series + PuiseuxPoly + """ + def __init__(self, symbols: str | list[Expr], domain: Domain): + + poly_ring = PolyRing(symbols, domain) + + domain = poly_ring.domain + ngens = poly_ring.ngens + + self.poly_ring = poly_ring + self.domain = domain + + self.symbols = poly_ring.symbols + self.gens = tuple([self.from_poly(g) for g in poly_ring.gens]) + self.ngens = ngens + + self.zero = self.from_poly(poly_ring.zero) + self.one = self.from_poly(poly_ring.one) + + self.zero_monom = poly_ring.zero_monom # type: ignore + self.monomial_mul = poly_ring.monomial_mul # type: ignore + + def __repr__(self) -> str: + return f"PuiseuxRing({self.symbols}, {self.domain})" + + def __eq__(self, other: Any) -> bool: + if not isinstance(other, PuiseuxRing): + return NotImplemented + return self.symbols == other.symbols and self.domain == other.domain + + def from_poly(self, poly: PolyElement) -> PuiseuxPoly: + """Create a Puiseux polynomial from a polynomial. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.puiseux import puiseux_ring + >>> R1, x1 = ring('x', QQ) + >>> R2, x2 = puiseux_ring('x', QQ) + >>> R2.from_poly(x1**2) + x**2 + """ + return PuiseuxPoly(poly, self) + + def from_dict(self, terms: dict[tuple[int, ...], Any]) -> PuiseuxPoly: + """Create a Puiseux polynomial from a dictionary of terms. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x = puiseux_ring('x', QQ) + >>> R.from_dict({(QQ(1,2),): QQ(3)}) + 3*x**(1/2) + """ + return PuiseuxPoly.from_dict(terms, self) + + def from_int(self, n: int) -> PuiseuxPoly: + """Create a Puiseux polynomial from an integer. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x = puiseux_ring('x', QQ) + >>> R.from_int(3) + 3 + """ + return self.from_poly(self.poly_ring(n)) + + def domain_new(self, arg: Any) -> Any: + """Create a new element of the domain. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x = puiseux_ring('x', QQ) + >>> R.domain_new(3) + 3 + >>> QQ.of_type(_) + True + """ + return self.poly_ring.domain_new(arg) + + def ground_new(self, arg: Any) -> PuiseuxPoly: + """Create a new element from a ground element. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring, PuiseuxPoly + >>> R, x = puiseux_ring('x', QQ) + >>> R.ground_new(3) + 3 + >>> isinstance(_, PuiseuxPoly) + True + """ + return self.from_poly(self.poly_ring.ground_new(arg)) + + def __call__(self, arg: Any) -> PuiseuxPoly: + """Coerce an element into the ring. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x = puiseux_ring('x', QQ) + >>> R(3) + 3 + >>> R({(QQ(1,2),): QQ(3)}) + 3*x**(1/2) + """ + if isinstance(arg, dict): + return self.from_dict(arg) + else: + return self.from_poly(self.poly_ring(arg)) + + def index(self, x: PuiseuxPoly) -> int: + """Return the index of a generator. + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x y', QQ) + >>> R.index(x) + 0 + >>> R.index(y) + 1 + """ + return self.gens.index(x) + + +def _div_poly_monom(poly: PolyElement, monom: Iterable[int]) -> PolyElement: + ring = poly.ring + div = ring.monomial_div + return ring.from_dict({div(m, monom): c for m, c in poly.terms()}) + + +def _mul_poly_monom(poly: PolyElement, monom: Iterable[int]) -> PolyElement: + ring = poly.ring + mul = ring.monomial_mul + return ring.from_dict({mul(m, monom): c for m, c in poly.terms()}) + + +def _div_monom(monom: Iterable[int], div: Iterable[int]) -> tuple[int, ...]: + return tuple(mi - di for mi, di in zip(monom, div)) + + +class PuiseuxPoly: + """Puiseux polynomial. Represents a truncated Puiseux series. + + See the :class:`PuiseuxRing` class for more information. + + >>> from sympy import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> p = 5*x**2 + 7*y**3 + >>> p + 7*y**3 + 5*x**2 + + The internal representation of a Puiseux polynomial wraps a normal + polynomial. To support negative powers the polynomial is considered to be + divided by a monomial. + + >>> p2 = 1/x + 1/y**2 + >>> p2.monom # x*y**2 + (1, 2) + >>> p2.poly + x + y**2 + >>> (y**2 + x) / (x*y**2) == p2 + True + + To support fractional powers the polynomial is considered to be a function + of ``x**(1/nx), y**(1/ny), ...``. The representation keeps track of a + monomial and a list of exponent denominators so that the polynomial can be + used to represent both negative and fractional powers. + + >>> p3 = x**QQ(1,2) + y**QQ(2,3) + >>> p3.ns + (2, 3) + >>> p3.poly + x + y**2 + + See Also + ======== + + sympy.polys.puiseux.PuiseuxRing + sympy.polys.rings.PolyElement + """ + + ring: PuiseuxRing + poly: PolyElement + monom: tuple[int, ...] | None + ns: tuple[int, ...] | None + + def __new__(cls, poly: PolyElement, ring: PuiseuxRing) -> PuiseuxPoly: + return cls._new(ring, poly, None, None) + + @classmethod + def _new( + cls, + ring: PuiseuxRing, + poly: PolyElement, + monom: tuple[int, ...] | None, + ns: tuple[int, ...] | None, + ) -> PuiseuxPoly: + poly, monom, ns = cls._normalize(poly, monom, ns) + return cls._new_raw(ring, poly, monom, ns) + + @classmethod + def _new_raw( + cls, + ring: PuiseuxRing, + poly: PolyElement, + monom: tuple[int, ...] | None, + ns: tuple[int, ...] | None, + ) -> PuiseuxPoly: + obj = object.__new__(cls) + obj.ring = ring + obj.poly = poly + obj.monom = monom + obj.ns = ns + return obj + + def __eq__(self, other: Any) -> bool: + if isinstance(other, PuiseuxPoly): + return ( + self.poly == other.poly + and self.monom == other.monom + and self.ns == other.ns + ) + elif self.monom is None and self.ns is None: + return self.poly.__eq__(other) + else: + return NotImplemented + + @classmethod + def _normalize( + cls, + poly: PolyElement, + monom: tuple[int, ...] | None, + ns: tuple[int, ...] | None, + ) -> tuple[PolyElement, tuple[int, ...] | None, tuple[int, ...] | None]: + if monom is None and ns is None: + return poly, None, None + + if monom is not None: + degs = [max(d, 0) for d in poly.tail_degrees()] + if all(di >= mi for di, mi in zip(degs, monom)): + poly = _div_poly_monom(poly, monom) + monom = None + elif any(degs): + poly = _div_poly_monom(poly, degs) + monom = _div_monom(monom, degs) + + if ns is not None: + factors_d, [poly_d] = poly.deflate() + degrees = poly.degrees() + monom_d = monom if monom is not None else [0] * len(degrees) + ns_new = [] + monom_new = [] + inflations = [] + for fi, ni, di, mi in zip(factors_d, ns, degrees, monom_d): + if di == 0: + g = gcd(ni, mi) + else: + g = gcd(fi, ni, mi) + ns_new.append(ni // g) + monom_new.append(mi // g) + inflations.append(fi // g) + + if any(infl > 1 for infl in inflations): + poly_d = poly_d.inflate(inflations) + + poly = poly_d + + if monom is not None: + monom = tuple(monom_new) + + if all(n == 1 for n in ns_new): + ns = None + else: + ns = tuple(ns_new) + + return poly, monom, ns + + @classmethod + def _monom_fromint( + cls, + monom: tuple[int, ...], + dmonom: tuple[int, ...] | None, + ns: tuple[int, ...] | None, + ) -> tuple[Any, ...]: + if dmonom is not None and ns is not None: + return tuple(QQ(mi - di, ni) for mi, di, ni in zip(monom, dmonom, ns)) + elif dmonom is not None: + return tuple(QQ(mi - di) for mi, di in zip(monom, dmonom)) + elif ns is not None: + return tuple(QQ(mi, ni) for mi, ni in zip(monom, ns)) + else: + return tuple(QQ(mi) for mi in monom) + + @classmethod + def _monom_toint( + cls, + monom: tuple[Any, ...], + dmonom: tuple[int, ...] | None, + ns: tuple[int, ...] | None, + ) -> tuple[int, ...]: + if dmonom is not None and ns is not None: + return tuple( + int((mi * ni).numerator + di) for mi, di, ni in zip(monom, dmonom, ns) + ) + elif dmonom is not None: + return tuple(int(mi.numerator + di) for mi, di in zip(monom, dmonom)) + elif ns is not None: + return tuple(int((mi * ni).numerator) for mi, ni in zip(monom, ns)) + else: + return tuple(int(mi.numerator) for mi in monom) + + def itermonoms(self) -> Iterator[tuple[Any, ...]]: + """Iterate over the monomials of a Puiseux polynomial. + + >>> from sympy import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> p = 5*x**2 + 7*y**3 + >>> list(p.itermonoms()) + [(2, 0), (0, 3)] + >>> p[(2, 0)] + 5 + """ + monom, ns = self.monom, self.ns + for m in self.poly.itermonoms(): + yield self._monom_fromint(m, monom, ns) + + def monoms(self) -> list[tuple[Any, ...]]: + """Return a list of the monomials of a Puiseux polynomial.""" + return list(self.itermonoms()) + + def __iter__(self) -> Iterator[tuple[tuple[Any, ...], Any]]: + return self.itermonoms() + + def __getitem__(self, monom: tuple[int, ...]) -> Any: + monom = self._monom_toint(monom, self.monom, self.ns) + return self.poly[monom] + + def __len__(self) -> int: + return len(self.poly) + + def iterterms(self) -> Iterator[tuple[tuple[Any, ...], Any]]: + """Iterate over the terms of a Puiseux polynomial. + + >>> from sympy import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> p = 5*x**2 + 7*y**3 + >>> list(p.iterterms()) + [((2, 0), 5), ((0, 3), 7)] + """ + monom, ns = self.monom, self.ns + for m, coeff in self.poly.iterterms(): + mq = self._monom_fromint(m, monom, ns) + yield mq, coeff + + def terms(self) -> list[tuple[tuple[Any, ...], Any]]: + """Return a list of the terms of a Puiseux polynomial.""" + return list(self.iterterms()) + + @property + def is_term(self) -> bool: + """Return True if the Puiseux polynomial is a single term.""" + return self.poly.is_term + + def to_dict(self) -> dict[tuple[int, ...], Any]: + """Return a dictionary representation of a Puiseux polynomial.""" + return dict(self.iterterms()) + + @classmethod + def from_dict( + cls, terms: dict[tuple[Any, ...], Any], ring: PuiseuxRing + ) -> PuiseuxPoly: + """Create a Puiseux polynomial from a dictionary of terms. + + >>> from sympy import QQ + >>> from sympy.polys.puiseux import puiseux_ring, PuiseuxPoly + >>> R, x = puiseux_ring('x', QQ) + >>> PuiseuxPoly.from_dict({(QQ(1,2),): QQ(3)}, R) + 3*x**(1/2) + >>> R.from_dict({(QQ(1,2),): QQ(3)}) + 3*x**(1/2) + """ + ns = [1] * ring.ngens + mon = [0] * ring.ngens + for mo in terms: + ns = [lcm(n, m.denominator) for n, m in zip(ns, mo)] + mon = [min(m, n) for m, n in zip(mo, mon)] + + if not any(mon): + monom = None + else: + monom = tuple(-int((m * n).numerator) for m, n in zip(mon, ns)) + + if all(n == 1 for n in ns): + ns_final = None + else: + ns_final = tuple(ns) + + terms_p = {cls._monom_toint(m, monom, ns_final): coeff for m, coeff in terms.items()} + + poly = ring.poly_ring.from_dict(terms_p) + + return cls._new(ring, poly, monom, ns_final) + + def as_expr(self) -> Expr: + """Convert a Puiseux polynomial to :class:`~sympy.core.expr.Expr`. + + >>> from sympy import QQ, Expr + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x = puiseux_ring('x', QQ) + >>> p = 5*x**2 + 7*x**3 + >>> p.as_expr() + 7*x**3 + 5*x**2 + >>> isinstance(_, Expr) + True + """ + ring = self.ring + dom = ring.domain + symbols = ring.symbols + terms = [] + for monom, coeff in self.iterterms(): + coeff_expr = dom.to_sympy(coeff) + monoms_expr = [] + for i, m in enumerate(monom): + monoms_expr.append(symbols[i] ** m) + terms.append(Mul(coeff_expr, *monoms_expr)) + return Add(*terms) + + def __repr__(self) -> str: + + def format_power(base: str, exp: int) -> str: + if exp == 1: + return base + elif exp >= 0 and int(exp) == exp: + return f"{base}**{exp}" + else: + return f"{base}**({exp})" + + ring = self.ring + dom = ring.domain + + syms = [str(s) for s in ring.symbols] + terms_str = [] + for monom, coeff in sorted(self.terms()): + monom_str = "*".join(format_power(s, e) for s, e in zip(syms, monom) if e) + if coeff == dom.one: + if monom_str: + terms_str.append(monom_str) + else: + terms_str.append("1") + elif not monom_str: + terms_str.append(str(coeff)) + else: + terms_str.append(f"{coeff}*{monom_str}") + + return " + ".join(terms_str) + + def _unify( + self, other: PuiseuxPoly + ) -> tuple[ + PolyElement, PolyElement, tuple[int, ...] | None, tuple[int, ...] | None + ]: + """Bring two Puiseux polynomials to a common monom and ns.""" + poly1, monom1, ns1 = self.poly, self.monom, self.ns + poly2, monom2, ns2 = other.poly, other.monom, other.ns + + if monom1 == monom2 and ns1 == ns2: + return poly1, poly2, monom1, ns1 + + if ns1 == ns2: + ns = ns1 + elif ns1 is not None and ns2 is not None: + ns = tuple(lcm(n1, n2) for n1, n2 in zip(ns1, ns2)) + f1 = [n // n1 for n, n1 in zip(ns, ns1)] + f2 = [n // n2 for n, n2 in zip(ns, ns2)] + poly1 = poly1.inflate(f1) + poly2 = poly2.inflate(f2) + if monom1 is not None: + monom1 = tuple(m * f for m, f in zip(monom1, f1)) + if monom2 is not None: + monom2 = tuple(m * f for m, f in zip(monom2, f2)) + elif ns2 is not None: + ns = ns2 + poly1 = poly1.inflate(ns) + if monom1 is not None: + monom1 = tuple(m * n for m, n in zip(monom1, ns)) + elif ns1 is not None: + ns = ns1 + poly2 = poly2.inflate(ns) + if monom2 is not None: + monom2 = tuple(m * n for m, n in zip(monom2, ns)) + else: + assert False + + if monom1 == monom2: + monom = monom1 + elif monom1 is not None and monom2 is not None: + monom = tuple(max(m1, m2) for m1, m2 in zip(monom1, monom2)) + poly1 = _mul_poly_monom(poly1, _div_monom(monom, monom1)) + poly2 = _mul_poly_monom(poly2, _div_monom(monom, monom2)) + elif monom2 is not None: + monom = monom2 + poly1 = _mul_poly_monom(poly1, monom2) + elif monom1 is not None: + monom = monom1 + poly2 = _mul_poly_monom(poly2, monom1) + else: + assert False + + return poly1, poly2, monom, ns + + def __pos__(self) -> PuiseuxPoly: + return self + + def __neg__(self) -> PuiseuxPoly: + return self._new_raw(self.ring, -self.poly, self.monom, self.ns) + + def __add__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, PuiseuxPoly): + if self.ring != other.ring: + raise ValueError("Cannot add Puiseux polynomials from different rings") + return self._add(other) + domain = self.ring.domain + if isinstance(other, int): + return self._add_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._add_ground(other) + else: + return NotImplemented + + def __radd__(self, other: Any) -> PuiseuxPoly: + domain = self.ring.domain + if isinstance(other, int): + return self._add_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._add_ground(other) + else: + return NotImplemented + + def __sub__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, PuiseuxPoly): + if self.ring != other.ring: + raise ValueError( + "Cannot subtract Puiseux polynomials from different rings" + ) + return self._sub(other) + domain = self.ring.domain + if isinstance(other, int): + return self._sub_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._sub_ground(other) + else: + return NotImplemented + + def __rsub__(self, other: Any) -> PuiseuxPoly: + domain = self.ring.domain + if isinstance(other, int): + return self._rsub_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._rsub_ground(other) + else: + return NotImplemented + + def __mul__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, PuiseuxPoly): + if self.ring != other.ring: + raise ValueError( + "Cannot multiply Puiseux polynomials from different rings" + ) + return self._mul(other) + domain = self.ring.domain + if isinstance(other, int): + return self._mul_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._mul_ground(other) + else: + return NotImplemented + + def __rmul__(self, other: Any) -> PuiseuxPoly: + domain = self.ring.domain + if isinstance(other, int): + return self._mul_ground(domain.convert_from(QQ(other), QQ)) + elif domain.of_type(other): + return self._mul_ground(other) + else: + return NotImplemented + + def __pow__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, int): + if other >= 0: + return self._pow_pint(other) + else: + return self._pow_nint(-other) + elif QQ.of_type(other): + return self._pow_rational(other) + else: + return NotImplemented + + def __truediv__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, PuiseuxPoly): + if self.ring != other.ring: + raise ValueError( + "Cannot divide Puiseux polynomials from different rings" + ) + return self._mul(other._inv()) + domain = self.ring.domain + if isinstance(other, int): + return self._mul_ground(domain.convert_from(QQ(1, other), QQ)) + elif domain.of_type(other): + return self._div_ground(other) + else: + return NotImplemented + + def __rtruediv__(self, other: Any) -> PuiseuxPoly: + if isinstance(other, int): + return self._inv()._mul_ground(self.ring.domain.convert_from(QQ(other), QQ)) + elif self.ring.domain.of_type(other): + return self._inv()._mul_ground(other) + else: + return NotImplemented + + def _add(self, other: PuiseuxPoly) -> PuiseuxPoly: + poly1, poly2, monom, ns = self._unify(other) + return self._new(self.ring, poly1 + poly2, monom, ns) + + def _add_ground(self, ground: Any) -> PuiseuxPoly: + return self._add(self.ring.ground_new(ground)) + + def _sub(self, other: PuiseuxPoly) -> PuiseuxPoly: + poly1, poly2, monom, ns = self._unify(other) + return self._new(self.ring, poly1 - poly2, monom, ns) + + def _sub_ground(self, ground: Any) -> PuiseuxPoly: + return self._sub(self.ring.ground_new(ground)) + + def _rsub_ground(self, ground: Any) -> PuiseuxPoly: + return self.ring.ground_new(ground)._sub(self) + + def _mul(self, other: PuiseuxPoly) -> PuiseuxPoly: + poly1, poly2, monom, ns = self._unify(other) + if monom is not None: + monom = tuple(2 * e for e in monom) + return self._new(self.ring, poly1 * poly2, monom, ns) + + def _mul_ground(self, ground: Any) -> PuiseuxPoly: + return self._new_raw(self.ring, self.poly * ground, self.monom, self.ns) + + def _div_ground(self, ground: Any) -> PuiseuxPoly: + return self._new_raw(self.ring, self.poly / ground, self.monom, self.ns) + + def _pow_pint(self, n: int) -> PuiseuxPoly: + assert n >= 0 + monom = self.monom + if monom is not None: + monom = tuple(m * n for m in monom) + return self._new(self.ring, self.poly**n, monom, self.ns) + + def _pow_nint(self, n: int) -> PuiseuxPoly: + return self._inv()._pow_pint(n) + + def _pow_rational(self, n: Any) -> PuiseuxPoly: + if not self.is_term: + raise ValueError("Only monomials can be raised to a rational power") + [(monom, coeff)] = self.terms() + domain = self.ring.domain + if not domain.is_one(coeff): + raise ValueError("Only monomials can be raised to a rational power") + monom = tuple(m * n for m in monom) + return self.ring.from_dict({monom: domain.one}) + + def _inv(self) -> PuiseuxPoly: + if not self.is_term: + raise ValueError("Only terms can be inverted") + [(monom, coeff)] = self.terms() + domain = self.ring.domain + if not domain.is_Field and not domain.is_one(coeff): + raise ValueError("Cannot invert non-unit coefficient") + monom = tuple(-m for m in monom) + coeff = 1 / coeff + return self.ring.from_dict({monom: coeff}) + + def diff(self, x: PuiseuxPoly) -> PuiseuxPoly: + """Differentiate a Puiseux polynomial with respect to a variable. + + >>> from sympy import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> p = 5*x**2 + 7*y**3 + >>> p.diff(x) + 10*x + >>> p.diff(y) + 21*y**2 + """ + ring = self.ring + i = ring.index(x) + g = {} + for expv, coeff in self.iterterms(): + n = expv[i] + if n: + e = list(expv) + e[i] -= 1 + g[tuple(e)] = coeff * n + return ring(g) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rationaltools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rationaltools.py new file mode 100644 index 0000000000000000000000000000000000000000..0ca513ff2d4af96baaaf1c82caf501750b1524da --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rationaltools.py @@ -0,0 +1,85 @@ +"""Tools for manipulation of rational expressions. """ + + +from sympy.core import Basic, Add, sympify +from sympy.core.exprtools import gcd_terms +from sympy.utilities import public +from sympy.utilities.iterables import iterable + + +@public +def together(expr, deep=False, fraction=True): + """ + Denest and combine rational expressions using symbolic methods. + + This function takes an expression or a container of expressions + and puts it (them) together by denesting and combining rational + subexpressions. No heroic measures are taken to minimize degree + of the resulting numerator and denominator. To obtain completely + reduced expression use :func:`~.cancel`. However, :func:`~.together` + can preserve as much as possible of the structure of the input + expression in the output (no expansion is performed). + + A wide variety of objects can be put together including lists, + tuples, sets, relational objects, integrals and others. It is + also possible to transform interior of function applications, + by setting ``deep`` flag to ``True``. + + By definition, :func:`~.together` is a complement to :func:`~.apart`, + so ``apart(together(expr))`` should return expr unchanged. Note + however, that :func:`~.together` uses only symbolic methods, so + it might be necessary to use :func:`~.cancel` to perform algebraic + simplification and minimize degree of the numerator and denominator. + + Examples + ======== + + >>> from sympy import together, exp + >>> from sympy.abc import x, y, z + + >>> together(1/x + 1/y) + (x + y)/(x*y) + >>> together(1/x + 1/y + 1/z) + (x*y + x*z + y*z)/(x*y*z) + + >>> together(1/(x*y) + 1/y**2) + (x + y)/(x*y**2) + + >>> together(1/(1 + 1/x) + 1/(1 + 1/y)) + (x*(y + 1) + y*(x + 1))/((x + 1)*(y + 1)) + + >>> together(exp(1/x + 1/y)) + exp(1/y + 1/x) + >>> together(exp(1/x + 1/y), deep=True) + exp((x + y)/(x*y)) + + >>> together(1/exp(x) + 1/(x*exp(x))) + (x + 1)*exp(-x)/x + + >>> together(1/exp(2*x) + 1/(x*exp(3*x))) + (x*exp(x) + 1)*exp(-3*x)/x + + """ + def _together(expr): + if isinstance(expr, Basic): + if expr.is_Atom or (expr.is_Function and not deep): + return expr + elif expr.is_Add: + return gcd_terms(list(map(_together, Add.make_args(expr))), fraction=fraction) + elif expr.is_Pow: + base = _together(expr.base) + + if deep: + exp = _together(expr.exp) + else: + exp = expr.exp + + return expr.func(base, exp) + else: + return expr.func(*[ _together(arg) for arg in expr.args ]) + elif iterable(expr): + return expr.__class__([ _together(ex) for ex in expr ]) + + return expr + + return _together(sympify(expr)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/ring_series.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/ring_series.py new file mode 100644 index 0000000000000000000000000000000000000000..b4333f0add9365991794d920a2699722900e8a5e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/ring_series.py @@ -0,0 +1,2127 @@ +"""Power series evaluation and manipulation using sparse Polynomials + +Implementing a new function +--------------------------- + +There are a few things to be kept in mind when adding a new function here:: + + - The implementation should work on all possible input domains/rings. + Special cases include the ``EX`` ring and a constant term in the series + to be expanded. There can be two types of constant terms in the series: + + + A constant value or symbol. + + A term of a multivariate series not involving the generator, with + respect to which the series is to expanded. + + Strictly speaking, a generator of a ring should not be considered a + constant. However, for series expansion both the cases need similar + treatment (as the user does not care about inner details), i.e, use an + addition formula to separate the constant part and the variable part (see + rs_sin for reference). + + - All the algorithms used here are primarily designed to work for Taylor + series (number of iterations in the algo equals the required order). + Hence, it becomes tricky to get the series of the right order if a + Puiseux series is input. Use rs_puiseux? in your function if your + algorithm is not designed to handle fractional powers. + +Extending rs_series +------------------- + +To make a function work with rs_series you need to do two things:: + + - Many sure it works with a constant term (as explained above). + - If the series contains constant terms, you might need to extend its ring. + You do so by adding the new terms to the rings as generators. + ``PolyRing.compose`` and ``PolyRing.add_gens`` are two functions that do + so and need to be called every time you expand a series containing a + constant term. + +Look at rs_sin and rs_series for further reference. + +""" + +from sympy.polys.domains import QQ, EX +from sympy.polys.rings import PolyElement, ring, sring +from sympy.polys.puiseux import PuiseuxPoly +from sympy.polys.polyerrors import DomainError +from sympy.polys.monomials import (monomial_min, monomial_mul, monomial_div, + monomial_ldiv) +from mpmath.libmp.libintmath import ifac +from sympy.core import PoleError, Function, Expr +from sympy.core.numbers import Rational +from sympy.core.intfunc import igcd +from sympy.functions import (sin, cos, tan, atan, exp, atanh, asinh, tanh, log, + ceiling, sinh, cosh) +from sympy.utilities.misc import as_int +from mpmath.libmp.libintmath import giant_steps +import math + + +def _invert_monoms(p1): + """ + Compute ``x**n * p1(1/x)`` for a univariate polynomial ``p1`` in ``x``. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import _invert_monoms + >>> R, x = ring('x', ZZ) + >>> p = x**2 + 2*x + 3 + >>> _invert_monoms(p) + 3*x**2 + 2*x + 1 + + See Also + ======== + + sympy.polys.densebasic.dup_reverse + """ + terms = list(p1.items()) + terms.sort() + deg = p1.degree() + R = p1.ring + p = R.zero + cv = p1.listcoeffs() + mv = p1.listmonoms() + for mvi, cvi in zip(mv, cv): + p[(deg - mvi[0],)] = cvi + return p + +def _giant_steps(target): + """Return a list of precision steps for the Newton's method""" + # We use ceil here because giant_steps cannot handle flint.fmpq + res = giant_steps(2, math.ceil(target)) + if res[0] != 2: + res = [2] + res + return res + +def rs_trunc(p1, x, prec): + """ + Truncate the series in the ``x`` variable with precision ``prec``, + that is, modulo ``O(x**prec)`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_trunc + >>> R, x = ring('x', QQ) + >>> p = x**10 + x**5 + x + 1 + >>> rs_trunc(p, x, 12) + x**10 + x**5 + x + 1 + >>> rs_trunc(p, x, 10) + x**5 + x + 1 + """ + R = p1.ring + p = {} + i = R.gens.index(x) + for exp1 in p1: + if exp1[i] >= prec: + continue + p[exp1] = p1[exp1] + return R(p) + +def rs_is_puiseux(p, x): + """ + Test if ``p`` is Puiseux series in ``x``. + + Raise an exception if it has a negative power in ``x``. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_is_puiseux + >>> R, x = puiseux_ring('x', QQ) + >>> p = x**QQ(2,5) + x**QQ(2,3) + x + >>> rs_is_puiseux(p, x) + True + """ + index = p.ring.gens.index(x) + for k in p.itermonoms(): + if k[index] != int(k[index]): + return True + if k[index] < 0: + raise ValueError('The series is not regular in %s' % x) + return False + +def rs_puiseux(f, p, x, prec): + """ + Return the puiseux series for `f(p, x, prec)`. + + To be used when function ``f`` is implemented only for regular series. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_puiseux, rs_exp + >>> R, x = puiseux_ring('x', QQ) + >>> p = x**QQ(2,5) + x**QQ(2,3) + x + >>> rs_puiseux(rs_exp,p, x, 1) + 1 + x**(2/5) + x**(2/3) + 1/2*x**(4/5) + """ + index = p.ring.gens.index(x) + n = 1 + for k in p: + power = k[index] + if isinstance(power, Rational): + num, den = power.as_numer_denom() + n = int(n*den // igcd(n, den)) + elif power != int(power): + den = power.denominator + n = int(n*den // igcd(n, den)) + if n != 1: + p1 = pow_xin(p, index, n) + r = f(p1, x, prec*n) + n1 = QQ(1, n) + if isinstance(r, tuple): + r = tuple([pow_xin(rx, index, n1) for rx in r]) + else: + r = pow_xin(r, index, n1) + else: + r = f(p, x, prec) + return r + +def rs_puiseux2(f, p, q, x, prec): + """ + Return the puiseux series for `f(p, q, x, prec)`. + + To be used when function ``f`` is implemented only for regular series. + """ + index = p.ring.gens.index(x) + n = 1 + for k in p: + power = k[index] + if isinstance(power, Rational): + num, den = power.as_numer_denom() + n = n*den // igcd(n, den) + elif power != int(power): + den = power.denominator + n = n*den // igcd(n, den) + if n != 1: + p1 = pow_xin(p, index, n) + r = f(p1, q, x, prec*n) + n1 = QQ(1, n) + r = pow_xin(r, index, n1) + else: + r = f(p, q, x, prec) + return r + +def rs_mul(p1, p2, x, prec): + """ + Return the product of the given two series, modulo ``O(x**prec)``. + + ``x`` is the series variable or its position in the generators. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_mul + >>> R, x = ring('x', QQ) + >>> p1 = x**2 + 2*x + 1 + >>> p2 = x + 1 + >>> rs_mul(p1, p2, x, 3) + 3*x**2 + 3*x + 1 + """ + R = p1.ring + p = {} + if R.__class__ != p2.ring.__class__ or R != p2.ring: + raise ValueError('p1 and p2 must have the same ring') + iv = R.gens.index(x) + if not isinstance(p2, (PolyElement, PuiseuxPoly)): + raise ValueError('p2 must be a polynomial') + if R == p2.ring: + get = p.get + items2 = p2.terms() + items2.sort(key=lambda e: e[0][iv]) + if R.ngens == 1: + for exp1, v1 in p1.iterterms(): + for exp2, v2 in items2: + exp = exp1[0] + exp2[0] + if exp < prec: + exp = (exp, ) + p[exp] = get(exp, 0) + v1*v2 + else: + break + else: + monomial_mul = R.monomial_mul + for exp1, v1 in p1.iterterms(): + for exp2, v2 in items2: + if exp1[iv] + exp2[iv] < prec: + exp = monomial_mul(exp1, exp2) + p[exp] = get(exp, 0) + v1*v2 + else: + break + + return R(p) + +def rs_square(p1, x, prec): + """ + Square the series modulo ``O(x**prec)`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_square + >>> R, x = ring('x', QQ) + >>> p = x**2 + 2*x + 1 + >>> rs_square(p, x, 3) + 6*x**2 + 4*x + 1 + """ + R = p1.ring + p = {} + iv = R.gens.index(x) + get = p.get + items = p1.terms() + items.sort(key=lambda e: e[0][iv]) + monomial_mul = R.monomial_mul + for i in range(len(items)): + exp1, v1 = items[i] + for j in range(i): + exp2, v2 = items[j] + if exp1[iv] + exp2[iv] < prec: + exp = monomial_mul(exp1, exp2) + p[exp] = get(exp, 0) + v1*v2 + else: + break + p = {m: 2*v for m, v in p.items()} + get = p.get + for expv, v in p1.iterterms(): + if 2*expv[iv] < prec: + e2 = monomial_mul(expv, expv) + p[e2] = get(e2, 0) + v**2 + return R(p) + +def rs_pow(p1, n, x, prec): + """ + Return ``p1**n`` modulo ``O(x**prec)`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_pow + >>> R, x = ring('x', QQ) + >>> p = x + 1 + >>> rs_pow(p, 4, x, 3) + 6*x**2 + 4*x + 1 + """ + R = p1.ring + if isinstance(n, Rational): + np = int(n.p) + nq = int(n.q) + if nq != 1: + res = rs_nth_root(p1, nq, x, prec) + if np != 1: + res = rs_pow(res, np, x, prec) + else: + res = rs_pow(p1, np, x, prec) + return res + + n = as_int(n) + if n == 0: + if p1: + return R(1) + else: + raise ValueError('0**0 is undefined') + if n < 0: + p1 = rs_pow(p1, -n, x, prec) + return rs_series_inversion(p1, x, prec) + if n == 1: + return rs_trunc(p1, x, prec) + if n == 2: + return rs_square(p1, x, prec) + if n == 3: + p2 = rs_square(p1, x, prec) + return rs_mul(p1, p2, x, prec) + p = R(1) + while 1: + if n & 1: + p = rs_mul(p1, p, x, prec) + n -= 1 + if not n: + break + p1 = rs_square(p1, x, prec) + n = n // 2 + return p + +def rs_subs(p, rules, x, prec): + """ + Substitution with truncation according to the mapping in ``rules``. + + Return a series with precision ``prec`` in the generator ``x`` + + Note that substitutions are not done one after the other + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_subs + >>> R, x, y = ring('x, y', QQ) + >>> p = x**2 + y**2 + >>> rs_subs(p, {x: x+ y, y: x+ 2*y}, x, 3) + 2*x**2 + 6*x*y + 5*y**2 + >>> (x + y)**2 + (x + 2*y)**2 + 2*x**2 + 6*x*y + 5*y**2 + + which differs from + + >>> rs_subs(rs_subs(p, {x: x+ y}, x, 3), {y: x+ 2*y}, x, 3) + 5*x**2 + 12*x*y + 8*y**2 + + Parameters + ---------- + p : :class:`~.PolyElement` Input series. + rules : ``dict`` with substitution mappings. + x : :class:`~.PolyElement` in which the series truncation is to be done. + prec : :class:`~.Integer` order of the series after truncation. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_subs + >>> R, x, y = ring('x, y', QQ) + >>> rs_subs(x**2+y**2, {y: (x+y)**2}, x, 3) + 6*x**2*y**2 + x**2 + 4*x*y**3 + y**4 + """ + R = p.ring + ngens = R.ngens + d = R(0) + for i in range(ngens): + d[(i, 1)] = R.gens[i] + for var in rules: + d[(R.index(var), 1)] = rules[var] + p1 = R(0) + p_keys = sorted(p.keys()) + for expv in p_keys: + p2 = R(1) + for i in range(ngens): + power = expv[i] + if power == 0: + continue + if (i, power) not in d: + q, r = divmod(power, 2) + if r == 0 and (i, q) in d: + d[(i, power)] = rs_square(d[(i, q)], x, prec) + elif (i, power - 1) in d: + d[(i, power)] = rs_mul(d[(i, power - 1)], d[(i, 1)], + x, prec) + else: + d[(i, power)] = rs_pow(d[(i, 1)], power, x, prec) + p2 = rs_mul(p2, d[(i, power)], x, prec) + p1 += p2*p[expv] + return p1 + +def _has_constant_term(p, x): + """ + Check if ``p`` has a constant term in ``x`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import _has_constant_term + >>> R, x = ring('x', QQ) + >>> p = x**2 + x + 1 + >>> _has_constant_term(p, x) + True + """ + R = p.ring + iv = R.gens.index(x) + zm = R.zero_monom + a = [0]*R.ngens + a[iv] = 1 + miv = tuple(a) + return any(monomial_min(expv, miv) == zm for expv in p) + +def _get_constant_term(p, x): + """Return constant term in p with respect to x + + Note that it is not simply `p[R.zero_monom]` as there might be multiple + generators in the ring R. We want the `x`-free term which can contain other + generators. + """ + R = p.ring + i = R.gens.index(x) + zm = R.zero_monom + a = [0]*R.ngens + a[i] = 1 + miv = tuple(a) + c = 0 + for expv in p: + if monomial_min(expv, miv) == zm: + c += R({expv: p[expv]}) + return c + +def _check_series_var(p, x, name): + index = p.ring.gens.index(x) + m = min(p, key=lambda k: k[index])[index] + if m < 0: + raise PoleError("Asymptotic expansion of %s around [oo] not " + "implemented." % name) + return index, m + +def _series_inversion1(p, x, prec): + """ + Univariate series inversion ``1/p`` modulo ``O(x**prec)``. + + The Newton method is used. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import _series_inversion1 + >>> R, x = ring('x', QQ) + >>> p = x + 1 + >>> _series_inversion1(p, x, 4) + -x**3 + x**2 - x + 1 + """ + if rs_is_puiseux(p, x): + return rs_puiseux(_series_inversion1, p, x, prec) + R = p.ring + zm = R.zero_monom + c = p[zm] + + # giant_steps does not seem to work with PythonRational numbers with 1 as + # denominator. This makes sure such a number is converted to integer. + if prec == int(prec): + prec = int(prec) + + if zm not in p: + raise ValueError("No constant term in series") + if _has_constant_term(p - c, x): + raise ValueError("p cannot contain a constant term depending on " + "parameters") + if not R.domain.is_unit(c): + raise ValueError(f"Constant term {c} must be a unit in {R.domain}") + + one = R(1) + if R.domain is EX: + one = 1 + if c != one: + p1 = R(1)/c + else: + p1 = R(1) + for precx in _giant_steps(prec): + t = 1 - rs_mul(p1, p, x, precx) + p1 = p1 + rs_mul(p1, t, x, precx) + return p1 + +def rs_series_inversion(p, x, prec): + """ + Multivariate series inversion ``1/p`` modulo ``O(x**prec)``. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_series_inversion + >>> R, x, y = ring('x, y', QQ) + >>> rs_series_inversion(1 + x*y**2, x, 4) + -x**3*y**6 + x**2*y**4 - x*y**2 + 1 + >>> rs_series_inversion(1 + x*y**2, y, 4) + -x*y**2 + 1 + >>> rs_series_inversion(x + x**2, x, 4) + x**3 - x**2 + x - 1 + x**(-1) + """ + R = p.ring + if p == R.zero: + raise ZeroDivisionError + zm = R.zero_monom + index = R.gens.index(x) + m = min(p, key=lambda k: k[index])[index] + if m: + p = mul_xin(p, index, -m) + prec = prec + m + if zm not in p: + raise NotImplementedError("No constant term in series") + + if _has_constant_term(p - p[zm], x): + raise NotImplementedError("p - p[0] must not have a constant term in " + "the series variables") + r = _series_inversion1(p, x, prec) + if m != 0: + r = mul_xin(r, index, -m) + return r + +def _coefficient_t(p, t): + r"""Coefficient of `x_i**j` in p, where ``t`` = (i, j)""" + i, j = t + R = p.ring + expv1 = [0]*R.ngens + expv1[i] = j + expv1 = tuple(expv1) + p1 = R(0) + for expv in p: + if expv[i] == j: + p1[monomial_div(expv, expv1)] = p[expv] + return p1 + +def rs_series_reversion(p, x, n, y): + r""" + Reversion of a series. + + ``p`` is a series with ``O(x**n)`` of the form $p = ax + f(x)$ + where $a$ is a number different from 0. + + $f(x) = \sum_{k=2}^{n-1} a_kx_k$ + + Parameters + ========== + + a_k : Can depend polynomially on other variables, not indicated. + x : Variable with name x. + y : Variable with name y. + + Returns + ======= + + Solve $p = y$, that is, given $ax + f(x) - y = 0$, + find the solution $x = r(y)$ up to $O(y^n)$. + + Algorithm + ========= + + If $r_i$ is the solution at order $i$, then: + $ar_i + f(r_i) - y = O\left(y^{i + 1}\right)$ + + and if $r_{i + 1}$ is the solution at order $i + 1$, then: + $ar_{i + 1} + f(r_{i + 1}) - y = O\left(y^{i + 2}\right)$ + + We have, $r_{i + 1} = r_i + e$, such that, + $ae + f(r_i) = O\left(y^{i + 2}\right)$ + or $e = -f(r_i)/a$ + + So we use the recursion relation: + $r_{i + 1} = r_i - f(r_i)/a$ + with the boundary condition: $r_1 = y$ + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_series_reversion, rs_trunc + >>> R, x, y, a, b = ring('x, y, a, b', QQ) + >>> p = x - x**2 - 2*b*x**2 + 2*a*b*x**2 + >>> p1 = rs_series_reversion(p, x, 3, y); p1 + -2*y**2*a*b + 2*y**2*b + y**2 + y + >>> rs_trunc(p.compose(x, p1), y, 3) + y + """ + if rs_is_puiseux(p, x): + raise NotImplementedError + R = p.ring + nx = R.gens.index(x) + y = R(y) + ny = R.gens.index(y) + if _has_constant_term(p, x): + raise ValueError("p must not contain a constant term in the series " + "variable") + a = _coefficient_t(p, (nx, 1)) + zm = R.zero_monom + assert zm in a and len(a) == 1 + a = a[zm] + r = y/a + for i in range(2, n): + sp = rs_subs(p, {x: r}, y, i + 1) + sp = _coefficient_t(sp, (ny, i))*y**i + r -= sp/a + return r + +def rs_series_from_list(p, c, x, prec, concur=1): + """ + Return a series `sum c[n]*p**n` modulo `O(x**prec)`. + + It reduces the number of multiplications by summing concurrently. + + `ax = [1, p, p**2, .., p**(J - 1)]` + `s = sum(c[i]*ax[i]` for i in `range(r, (r + 1)*J))*p**((K - 1)*J)` + with `K >= (n + 1)/J` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_series_from_list, rs_trunc + >>> R, x = ring('x', QQ) + >>> p = x**2 + x + 1 + >>> c = [1, 2, 3] + >>> rs_series_from_list(p, c, x, 4) + 6*x**3 + 11*x**2 + 8*x + 6 + >>> rs_trunc(1 + 2*p + 3*p**2, x, 4) + 6*x**3 + 11*x**2 + 8*x + 6 + >>> pc = R.from_list(list(reversed(c))) + >>> rs_trunc(pc.compose(x, p), x, 4) + 6*x**3 + 11*x**2 + 8*x + 6 + + See Also + ======== + + sympy.polys.rings.PolyRing.compose + + """ + R = p.ring + n = len(c) + if not concur: + q = R(1) + s = c[0]*q + for i in range(1, n): + q = rs_mul(q, p, x, prec) + s += c[i]*q + return s + J = int(math.sqrt(n) + 1) + K, r = divmod(n, J) + if r: + K += 1 + ax = [R(1)] + q = R(1) + if len(p) < 20: + for i in range(1, J): + q = rs_mul(q, p, x, prec) + ax.append(q) + else: + for i in range(1, J): + if i % 2 == 0: + q = rs_square(ax[i//2], x, prec) + else: + q = rs_mul(q, p, x, prec) + ax.append(q) + # optimize using rs_square + pj = rs_mul(ax[-1], p, x, prec) + b = R(1) + s = R(0) + for k in range(K - 1): + r = J*k + s1 = c[r] + for j in range(1, J): + s1 += c[r + j]*ax[j] + s1 = rs_mul(s1, b, x, prec) + s += s1 + b = rs_mul(b, pj, x, prec) + if not b: + break + k = K - 1 + r = J*k + if r < n: + s1 = c[r]*R(1) + for j in range(1, J): + if r + j >= n: + break + s1 += c[r + j]*ax[j] + s1 = rs_mul(s1, b, x, prec) + s += s1 + return s + +def rs_diff(p, x): + """ + Return partial derivative of ``p`` with respect to ``x``. + + Parameters + ========== + + x : :class:`~.PolyElement` with respect to which ``p`` is differentiated. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_diff + >>> R, x, y = ring('x, y', QQ) + >>> p = x + x**2*y**3 + >>> rs_diff(p, x) + 2*x*y**3 + 1 + """ + R = p.ring + n = R.gens.index(x) + p1 = {} + mn = [0]*R.ngens + mn[n] = 1 + mn = tuple(mn) + for expv in p: + if expv[n]: + e = monomial_ldiv(expv, mn) + p1[e] = R.domain_new(p[expv]*expv[n]) + return R(p1) + +def rs_integrate(p, x): + """ + Integrate ``p`` with respect to ``x``. + + Parameters + ========== + + x : :class:`~.PolyElement` with respect to which ``p`` is integrated. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_integrate + >>> R, x, y = ring('x, y', QQ) + >>> p = x + x**2*y**3 + >>> rs_integrate(p, x) + 1/3*x**3*y**3 + 1/2*x**2 + """ + R = p.ring + p1 = {} + n = R.gens.index(x) + mn = [0]*R.ngens + mn[n] = 1 + mn = tuple(mn) + + for expv in p: + e = monomial_mul(expv, mn) + p1[e] = R.domain_new(p[expv]/(expv[n] + 1)) + return R(p1) + +def rs_fun(p, f, *args): + r""" + Function of a multivariate series computed by substitution. + + The case with f method name is used to compute `rs\_tan` and `rs\_nth\_root` + of a multivariate series: + + `rs\_fun(p, tan, iv, prec)` + + tan series is first computed for a dummy variable _x, + i.e, `rs\_tan(\_x, iv, prec)`. Then we substitute _x with p to get the + desired series + + Parameters + ========== + + p : :class:`~.PolyElement` The multivariate series to be expanded. + f : `ring\_series` function to be applied on `p`. + args[-2] : :class:`~.PolyElement` with respect to which, the series is to be expanded. + args[-1] : Required order of the expanded series. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_fun, _tan1 + >>> R, x, y = ring('x, y', QQ) + >>> p = x + x*y + x**2*y + x**3*y**2 + >>> rs_fun(p, _tan1, x, 4) + 1/3*x**3*y**3 + 2*x**3*y**2 + x**3*y + 1/3*x**3 + x**2*y + x*y + x + """ + _R = p.ring + R1, _x = ring('_x', _R.domain) + h = int(args[-1]) + args1 = args[:-2] + (_x, h) + zm = _R.zero_monom + # separate the constant term of the series + # compute the univariate series f(_x, .., 'x', sum(nv)) + if zm in p: + x1 = _x + p[zm] + p1 = p - p[zm] + else: + x1 = _x + p1 = p + if isinstance(f, str): + q = getattr(x1, f)(*args1) + else: + q = f(x1, *args1) + a = sorted(q.items()) + c = [0]*h + for x in a: + c[x[0][0]] = x[1] + p1 = rs_series_from_list(p1, c, args[-2], args[-1]) + return p1 + +def mul_xin(p, i, n): + r""" + Return `p*x_i**n`. + + `x\_i` is the ith variable in ``p``. + """ + R = p.ring + q = {} + for k, v in p.terms(): + k1 = list(k) + k1[i] += n + q[tuple(k1)] = v + return R(q) + +def pow_xin(p, i, n): + """ + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import pow_xin + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> p = x**QQ(2,5) + x + x**QQ(2,3) + >>> index = p.ring.gens.index(x) + >>> pow_xin(p, index, 15) + x**6 + x**10 + x**15 + """ + R = p.ring + q = {} + for k, v in p.terms(): + k1 = list(k) + k1[i] *= n + q[tuple(k1)] = v + return R(q) + +def _nth_root1(p, n, x, prec): + """ + Univariate series expansion of the nth root of ``p``. + + The Newton method is used. + """ + if rs_is_puiseux(p, x): + return rs_puiseux2(_nth_root1, p, n, x, prec) + R = p.ring + zm = R.zero_monom + if zm not in p: + raise NotImplementedError('No constant term in series') + n = as_int(n) + assert p[zm] == 1 + p1 = R(1) + if p == 1: + return p + if n == 0: + return R(1) + if n == 1: + return p + if n < 0: + n = -n + sign = 1 + else: + sign = 0 + for precx in _giant_steps(prec): + tmp = rs_pow(p1, n + 1, x, precx) + tmp = rs_mul(tmp, p, x, precx) + p1 += p1/n - tmp/n + if sign: + return p1 + else: + return _series_inversion1(p1, x, prec) + +def rs_nth_root(p, n, x, prec): + """ + Multivariate series expansion of the nth root of ``p``. + + Parameters + ========== + + p : Expr + The polynomial to computer the root of. + n : integer + The order of the root to be computed. + x : :class:`~.PolyElement` + prec : integer + Order of the expanded series. + + Notes + ===== + + The result of this function is dependent on the ring over which the + polynomial has been defined. If the answer involves a root of a constant, + make sure that the polynomial is over a real field. It cannot yet handle + roots of symbols. + + Examples + ======== + + >>> from sympy.polys.domains import QQ, RR + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_nth_root + >>> R, x, y = ring('x, y', QQ) + >>> rs_nth_root(1 + x + x*y, -3, x, 3) + 2/9*x**2*y**2 + 4/9*x**2*y + 2/9*x**2 - 1/3*x*y - 1/3*x + 1 + >>> R, x, y = ring('x, y', RR) + >>> rs_nth_root(3 + x + x*y, 3, x, 2) + 0.160249952256379*x*y + 0.160249952256379*x + 1.44224957030741 + """ + if n == 0: + if p == 0: + raise ValueError('0**0 expression') + else: + return p.ring(1) + if n == 1: + return rs_trunc(p, x, prec) + R = p.ring + index = R.gens.index(x) + m = min(p, key=lambda k: k[index])[index] + p = mul_xin(p, index, -m) + prec -= m + + if _has_constant_term(p - 1, x): + zm = R.zero_monom + c = p[zm] + if isinstance(c, PolyElement): + try: + c_expr = c.as_expr() + const = R(c_expr**(QQ(1, n))) + except ValueError: + raise DomainError("The given series cannot be expanded in " + "this domain.") + else: + try: # RealElement doesn't support + const = R(c**Rational(1, n)) # exponentiation with mpq object + except ValueError: # as exponent + raise DomainError("The given series cannot be expanded in " + "this domain.") + res = rs_nth_root(p/c, n, x, prec)*const + else: + res = _nth_root1(p, n, x, prec) + if m: + m = QQ(m) / n + res = mul_xin(res, index, m) + return res + +def rs_log(p, x, prec): + """ + The Logarithm of ``p`` modulo ``O(x**prec)``. + + Notes + ===== + + Truncation of ``integral dx p**-1*d p/dx`` is used. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_log + >>> R, x = puiseux_ring('x', QQ) + >>> rs_log(1 + x, x, 8) + x + -1/2*x**2 + 1/3*x**3 + -1/4*x**4 + 1/5*x**5 + -1/6*x**6 + 1/7*x**7 + >>> rs_log(x**QQ(3, 2) + 1, x, 5) + x**(3/2) + -1/2*x**3 + 1/3*x**(9/2) + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_log, p, x, prec) + R = p.ring + if p == 1: + return R.zero + c = _get_constant_term(p, x) + if c: + const = 0 + if c == 1: + pass + try: + c_expr = c.as_expr() + const = R(log(c_expr)) + except ValueError: + R = R.add_gens([log(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + const = R(log(c_expr)) + + dlog = p.diff(x) + dlog = rs_mul(dlog, _series_inversion1(p, x, prec), x, prec - 1) + return rs_integrate(dlog, x) + const + else: + raise NotImplementedError + +def rs_LambertW(p, x, prec): + """ + Calculate the series expansion of the principal branch of the Lambert W + function. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_LambertW + >>> R, x, y = ring('x, y', QQ) + >>> rs_LambertW(x + x*y, x, 3) + -x**2*y**2 - 2*x**2*y - x**2 + x*y + x + + See Also + ======== + + LambertW + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_LambertW, p, x, prec) + R = p.ring + p1 = R(0) + if _has_constant_term(p, x): + raise NotImplementedError("Polynomial must not have constant term in " + "the series variables") + if x in R.gens: + for precx in _giant_steps(prec): + e = rs_exp(p1, x, precx) + p2 = rs_mul(e, p1, x, precx) - p + p3 = rs_mul(e, p1 + 1, x, precx) + p3 = rs_series_inversion(p3, x, precx) + tmp = rs_mul(p2, p3, x, precx) + p1 -= tmp + return p1 + else: + raise NotImplementedError + +def _exp1(p, x, prec): + r"""Helper function for `rs\_exp`. """ + R = p.ring + p1 = R(1) + for precx in _giant_steps(prec): + pt = p - rs_log(p1, x, precx) + tmp = rs_mul(pt, p1, x, precx) + p1 += tmp + return p1 + +def rs_exp(p, x, prec): + """ + Exponentiation of a series modulo ``O(x**prec)`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_exp + >>> R, x = ring('x', QQ) + >>> rs_exp(x**2, x, 7) + 1/6*x**6 + 1/2*x**4 + x**2 + 1 + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_exp, p, x, prec) + R = p.ring + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(exp(c_expr)) + except ValueError: + R = R.add_gens([exp(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + const = R(exp(c_expr)) + + p1 = p - c + + # Makes use of SymPy functions to evaluate the values of the cos/sin + # of the constant term. + return const*rs_exp(p1, x, prec) + + if len(p) > 20: + return _exp1(p, x, prec) + one = R(1) + n = 1 + c = [] + for k in range(prec): + c.append(one/n) + k += 1 + n *= k + + r = rs_series_from_list(p, c, x, prec) + return r + +def _atan(p, iv, prec): + """ + Expansion using formula. + + Faster on very small and univariate series. + """ + R = p.ring + mo = R(-1) + c = [-mo] + p2 = rs_square(p, iv, prec) + for k in range(1, prec): + c.append(mo**k/(2*k + 1)) + s = rs_series_from_list(p2, c, iv, prec) + s = rs_mul(s, p, iv, prec) + return s + +def rs_atan(p, x, prec): + """ + The arctangent of a series + + Return the series expansion of the atan of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_atan + >>> R, x, y = ring('x, y', QQ) + >>> rs_atan(x + x*y, x, 4) + -1/3*x**3*y**3 - x**3*y**2 - x**3*y - 1/3*x**3 + x*y + x + + See Also + ======== + + atan + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_atan, p, x, prec) + R = p.ring + const = 0 + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(atan(c_expr)) + except ValueError: + R = R.add_gens([atan(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + const = R(atan(c_expr)) + + # Instead of using a closed form formula, we differentiate atan(p) to get + # `1/(1+p**2) * dp`, whose series expansion is much easier to calculate. + # Finally we integrate to get back atan + dp = p.diff(x) + p1 = rs_square(p, x, prec) + R(1) + p1 = rs_series_inversion(p1, x, prec - 1) + p1 = rs_mul(dp, p1, x, prec - 1) + return rs_integrate(p1, x) + const + +def rs_asin(p, x, prec): + """ + Arcsine of a series + + Return the series expansion of the asin of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_asin + >>> R, x, y = ring('x, y', QQ) + >>> rs_asin(x, x, 8) + 5/112*x**7 + 3/40*x**5 + 1/6*x**3 + x + + See Also + ======== + + asin + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_asin, p, x, prec) + if _has_constant_term(p, x): + raise NotImplementedError("Polynomial must not have constant term in " + "series variables") + R = p.ring + if x in R.gens: + # get a good value + if len(p) > 20: + dp = rs_diff(p, x) + p1 = 1 - rs_square(p, x, prec - 1) + p1 = rs_nth_root(p1, -2, x, prec - 1) + p1 = rs_mul(dp, p1, x, prec - 1) + return rs_integrate(p1, x) + one = R(1) + c = [0, one, 0] + for k in range(3, prec, 2): + c.append((k - 2)**2*c[-2]/(k*(k - 1))) + c.append(0) + return rs_series_from_list(p, c, x, prec) + + else: + raise NotImplementedError + +def _tan1(p, x, prec): + r""" + Helper function of :func:`rs_tan`. + + Return the series expansion of tan of a univariate series using Newton's + method. It takes advantage of the fact that series expansion of atan is + easier than that of tan. + + Consider `f(x) = y - \arctan(x)` + Let r be a root of f(x) found using Newton's method. + Then `f(r) = 0` + Or `y = \arctan(x)` where `x = \tan(y)` as required. + """ + R = p.ring + p1 = R(0) + for precx in _giant_steps(prec): + tmp = p - rs_atan(p1, x, precx) + tmp = rs_mul(tmp, 1 + rs_square(p1, x, precx), x, precx) + p1 += tmp + return p1 + +def rs_tan(p, x, prec): + """ + Tangent of a series. + + Return the series expansion of the tan of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_tan + >>> R, x, y = ring('x, y', QQ) + >>> rs_tan(x + x*y, x, 4) + 1/3*x**3*y**3 + x**3*y**2 + x**3*y + 1/3*x**3 + x*y + x + + See Also + ======== + + _tan1, tan + """ + if rs_is_puiseux(p, x): + r = rs_puiseux(rs_tan, p, x, prec) + return r + R = p.ring + const = 0 + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(tan(c_expr)) + except ValueError: + R = R.add_gens([tan(c_expr, )]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + const = R(tan(c_expr)) + + p1 = p - c + + # Makes use of SymPy functions to evaluate the values of the cos/sin + # of the constant term. + t2 = rs_tan(p1, x, prec) + t = rs_series_inversion(1 - const*t2, x, prec) + return rs_mul(const + t2, t, x, prec) + + if R.ngens == 1: + return _tan1(p, x, prec) + else: + return rs_fun(p, rs_tan, x, prec) + +def rs_cot(p, x, prec): + """ + Cotangent of a series + + Return the series expansion of the cot of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_cot + >>> R, x, y = ring('x, y', QQ) + >>> rs_cot(x, x, 6) + -2/945*x**5 - 1/45*x**3 - 1/3*x + x**(-1) + + See Also + ======== + + cot + """ + # It can not handle series like `p = x + x*y` where the coefficient of the + # linear term in the series variable is symbolic. + if rs_is_puiseux(p, x): + r = rs_puiseux(rs_cot, p, x, prec) + return r + i, m = _check_series_var(p, x, 'cot') + prec1 = int(prec + 2*m) + c, s = rs_cos_sin(p, x, prec1) + s = mul_xin(s, i, -m) + s = rs_series_inversion(s, x, prec1) + res = rs_mul(c, s, x, prec1) + res = mul_xin(res, i, -m) + res = rs_trunc(res, x, prec) + return res + +def rs_sin(p, x, prec): + """ + Sine of a series + + Return the series expansion of the sin of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_sin + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> rs_sin(x + x*y, x, 4) + x + x*y + -1/6*x**3 + -1/2*x**3*y + -1/2*x**3*y**2 + -1/6*x**3*y**3 + >>> rs_sin(x**QQ(3, 2) + x*y**QQ(7, 5), x, 4) + x*y**(7/5) + x**(3/2) + -1/6*x**3*y**(21/5) + -1/2*x**(7/2)*y**(14/5) + + See Also + ======== + + sin + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_sin, p, x, prec) + R = x.ring + if not p: + return R(0) + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + except ValueError: + R = R.add_gens([sin(c_expr), cos(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + + p1 = p - c + + # Makes use of SymPy cos, sin functions to evaluate the values of the + # cos/sin of the constant term. + p_cos, p_sin = rs_cos_sin(p1, x, prec) + return p_sin*t2 + p_cos*t1 + + # Series is calculated in terms of tan as its evaluation is fast. + if len(p) > 20 and R.ngens == 1: + t = rs_tan(p/2, x, prec) + t2 = rs_square(t, x, prec) + p1 = rs_series_inversion(1 + t2, x, prec) + return rs_mul(p1, 2*t, x, prec) + one = R(1) + n = 1 + c = [0] + for k in range(2, prec + 2, 2): + c.append(one/n) + c.append(0) + n *= -k*(k + 1) + return rs_series_from_list(p, c, x, prec) + +def rs_cos(p, x, prec): + """ + Cosine of a series + + Return the series expansion of the cos of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.puiseux import puiseux_ring + >>> from sympy.polys.ring_series import rs_cos + >>> R, x, y = puiseux_ring('x, y', QQ) + >>> rs_cos(x + x*y, x, 4) + 1 + -1/2*x**2 + -1*x**2*y + -1/2*x**2*y**2 + >>> rs_cos(x + x*y, x, 4)/x**QQ(7, 5) + x**(-7/5) + -1/2*x**(3/5) + -1*x**(3/5)*y + -1/2*x**(3/5)*y**2 + + See Also + ======== + + cos + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_cos, p, x, prec) + R = p.ring + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + except ValueError: + R = R.add_gens([sin(c_expr), cos(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + + p1 = p - c + # Makes use of SymPy cos, sin functions to evaluate the values of the + # cos/sin of the constant term. + p_cos, p_sin = rs_cos_sin(p1, x, prec) + return p_cos*t2 - p_sin*t1 + + # Series is calculated in terms of tan as its evaluation is fast. + if len(p) > 20 and R.ngens == 1: + t = rs_tan(p/2, x, prec) + t2 = rs_square(t, x, prec) + p1 = rs_series_inversion(1+t2, x, prec) + return rs_mul(p1, 1 - t2, x, prec) + one = R(1) + n = 1 + c = [] + for k in range(2, prec + 2, 2): + c.append(one/n) + c.append(0) + n *= -k*(k - 1) + return rs_series_from_list(p, c, x, prec) + +def rs_cos_sin(p, x, prec): + """ + Cosine and sine of a series + + Return the series expansion of the cosine and sine of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_cos_sin + >>> R, x, y = ring('x, y', QQ) + >>> c, s = rs_cos_sin(x + x*y, x, 4) + >>> c + -1/2*x**2*y**2 - x**2*y - 1/2*x**2 + 1 + >>> s + -1/6*x**3*y**3 - 1/2*x**3*y**2 - 1/2*x**3*y - 1/6*x**3 + x*y + x + + See Also + ======== + + rs_cos, rs_sin + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_cos_sin, p, x, prec) + R = p.ring + if not p: + return R(0), R(0) + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + except ValueError: + R = R.add_gens([sin(c_expr), cos(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sin(c_expr)), R(cos(c_expr)) + + p1 = p - c + p_cos, p_sin = rs_cos_sin(p1, x, prec) + return p_cos*t2 - p_sin*t1, p_cos*t1 + p_sin*t2 + + if len(p) > 20 and R.ngens == 1: + t = rs_tan(p/2, x, prec) + t2 = rs_square(t, x, prec) + p1 = rs_series_inversion(1 + t2, x, prec) + return (rs_mul(p1, 1 - t2, x, prec), rs_mul(p1, 2*t, x, prec)) + + one = R(1) + coeffs = [] + cn, sn = 1, 1 + for k in range(2, prec+2, 2): + coeffs.extend([(one/cn, 0), (0, one/sn)]) + cn, sn = -cn*k*(k - 1), -sn*k*(k + 1) + + c, s = zip(*coeffs) + return (rs_series_from_list(p, c, x, prec), rs_series_from_list(p, s, x, prec)) + +def _atanh(p, x, prec): + """ + Expansion using formula + + Faster for very small and univariate series + """ + R = p.ring + one = R(1) + c = [one] + p2 = rs_square(p, x, prec) + for k in range(1, prec): + c.append(one/(2*k + 1)) + s = rs_series_from_list(p2, c, x, prec) + s = rs_mul(s, p, x, prec) + return s + +def rs_atanh(p, x, prec): + """ + Hyperbolic arctangent of a series + + Return the series expansion of the atanh of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_atanh + >>> R, x, y = ring('x, y', QQ) + >>> rs_atanh(x + x*y, x, 4) + 1/3*x**3*y**3 + x**3*y**2 + x**3*y + 1/3*x**3 + x*y + x + + See Also + ======== + + atanh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_atanh, p, x, prec) + R = p.ring + const = 0 + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(atanh(c_expr)) + except ValueError: + raise DomainError("The given series cannot be expanded in " + "this domain.") + + # Instead of using a closed form formula, we differentiate atanh(p) to get + # `1/(1-p**2) * dp`, whose series expansion is much easier to calculate. + # Finally we integrate to get back atanh + dp = rs_diff(p, x) + p1 = - rs_square(p, x, prec) + 1 + p1 = rs_series_inversion(p1, x, prec - 1) + p1 = rs_mul(dp, p1, x, prec - 1) + return rs_integrate(p1, x) + const + +def rs_asinh(p, x, prec): + """ + Hyperbolic arcsine of a series + + Return the series expansion of the arcsinh of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_asinh + >>> R, x = ring('x', QQ) + >>> rs_asinh(x, x, 9) + -5/112*x**7 + 3/40*x**5 - 1/6*x**3 + x + + See Also + ======== + + asinh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_asinh, p, x, prec) + R = p.ring + const = 0 + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(asinh(c_expr)) + except ValueError: + raise DomainError("The given series cannot be expanded in " + "this domain.") + + # Instead of using a closed form formula, we differentiate asinh(p) to get + # `1/sqrt(1+p**2) * dp`, whose series expansion is much easier to calculate. + # Finally we integrate to get back asinh + dp = rs_diff(p, x) + p_squared = rs_square(p, x, prec) + denom = p_squared + R(1) + p1 = rs_nth_root(denom, -2, x, prec - 1) + p1 = rs_mul(dp, p1, x, prec - 1) + return rs_integrate(p1, x) + const + +def rs_sinh(p, x, prec): + """ + Hyperbolic sine of a series + + Return the series expansion of the sinh of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_sinh + >>> R, x, y = ring('x, y', QQ) + >>> rs_sinh(x + x*y, x, 4) + 1/6*x**3*y**3 + 1/2*x**3*y**2 + 1/2*x**3*y + 1/6*x**3 + x*y + x + + See Also + ======== + + sinh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_sinh, p, x, prec) + R = p.ring + if not p: + return R(0) + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + except ValueError: + R = R.add_gens([sinh(c_expr), cosh(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + + p1 = p - c + p_cosh, p_sinh = rs_cosh_sinh(p1, x, prec) + return p_sinh * t2 + p_cosh * t1 + + t = rs_exp(p, x, prec) + t1 = rs_series_inversion(t, x, prec) + return (t - t1)/2 + +def rs_cosh(p, x, prec): + """ + Hyperbolic cosine of a series + + Return the series expansion of the cosh of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_cosh + >>> R, x, y = ring('x, y', QQ) + >>> rs_cosh(x + x*y, x, 4) + 1/2*x**2*y**2 + x**2*y + 1/2*x**2 + 1 + + See Also + ======== + + cosh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_cosh, p, x, prec) + R = p.ring + if not p: + return R(0) + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + except ValueError: + R = R.add_gens([sinh(c_expr), cosh(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + + p1 = p - c + p_cosh, p_sinh = rs_cosh_sinh(p1, x, prec) + return p_cosh * t2 + p_sinh * t1 + + t = rs_exp(p, x, prec) + t1 = rs_series_inversion(t, x, prec) + return (t + t1)/2 + +def rs_cosh_sinh(p, x, prec): + """ + Hyperbolic cosine and sine of a series + + Return the series expansion of the hyperbolic cosine and sine of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_cosh_sinh + >>> R, x, y = ring('x, y', QQ) + >>> c, s = rs_cosh_sinh(x + x*y, x, 4) + >>> c + 1/2*x**2*y**2 + x**2*y + 1/2*x**2 + 1 + >>> s + 1/6*x**3*y**3 + 1/2*x**3*y**2 + 1/2*x**3*y + 1/6*x**3 + x*y + x + + See Also + ======== + + rs_cosh, rs_sinh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_cosh_sinh, p, x, prec) + R = p.ring + if not p: + return R(0), R(0) + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + except ValueError: + R = R.add_gens([sinh(c_expr), cosh(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + t1, t2 = R(sinh(c_expr)), R(cosh(c_expr)) + + p1 = p - c + p_cosh, p_sinh = rs_cosh_sinh(p1, x, prec) + return p_cosh * t2 + p_sinh * t1, p_sinh * t2 + p_cosh * t1 + + t = rs_exp(p, x, prec) + t1 = rs_series_inversion(t, x, prec) + return (t + t1)/2, (t - t1)/2 + + +def _tanh(p, x, prec): + r""" + Helper function of :func:`rs_tanh` + + Return the series expansion of tanh of a univariate series using Newton's + method. It takes advantage of the fact that series expansion of atanh is + easier than that of tanh. + + See Also + ======== + + _tanh + """ + R = p.ring + p1 = R(0) + for precx in _giant_steps(prec): + tmp = p - rs_atanh(p1, x, precx) + tmp = rs_mul(tmp, 1 - rs_square(p1, x, prec), x, precx) + p1 += tmp + return p1 + +def rs_tanh(p, x, prec): + """ + Hyperbolic tangent of a series + + Return the series expansion of the tanh of ``p``, about 0. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_tanh + >>> R, x, y = ring('x, y', QQ) + >>> rs_tanh(x + x*y, x, 4) + -1/3*x**3*y**3 - x**3*y**2 - x**3*y - 1/3*x**3 + x*y + x + + See Also + ======== + + tanh + """ + if rs_is_puiseux(p, x): + return rs_puiseux(rs_tanh, p, x, prec) + R = p.ring + const = 0 + c = _get_constant_term(p, x) + if c: + try: + c_expr = c.as_expr() + const = R(tanh(c_expr)) + except ValueError: + R = R.add_gens([tanh(c_expr)]) + p = p.set_ring(R) + x = x.set_ring(R) + c = c.set_ring(R) + const = R(tanh(c_expr)) + + p1 = p - c + t1 = rs_tanh(p1, x, prec) + t = rs_series_inversion(1 + const*t1, x, prec) + return rs_mul(const + t1, t, x, prec) + + if R.ngens == 1: + return _tanh(p, x, prec) + else: + return rs_fun(p, _tanh, x, prec) + +def rs_newton(p, x, prec): + """ + Compute the truncated Newton sum of the polynomial ``p`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_newton + >>> R, x = ring('x', QQ) + >>> p = x**2 - 2 + >>> rs_newton(p, x, 5) + 8*x**4 + 4*x**2 + 2 + """ + deg = p.degree() + p1 = _invert_monoms(p) + p2 = rs_series_inversion(p1, x, prec) + p3 = rs_mul(p1.diff(x), p2, x, prec) + res = deg - p3*x + return res + +def rs_hadamard_exp(p1, inverse=False): + """ + Return ``sum f_i/i!*x**i`` from ``sum f_i*x**i``, + where ``x`` is the first variable. + + If ``inverse=True`` return ``sum f_i*i!*x**i`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_hadamard_exp + >>> R, x = ring('x', QQ) + >>> p = 1 + x + x**2 + x**3 + >>> rs_hadamard_exp(p) + 1/6*x**3 + 1/2*x**2 + x + 1 + """ + R = p1.ring + if R.domain != QQ: + raise NotImplementedError + p = R.zero + if not inverse: + for exp1, v1 in p1.items(): + p[exp1] = v1/int(ifac(exp1[0])) + else: + for exp1, v1 in p1.items(): + p[exp1] = v1*int(ifac(exp1[0])) + return p + +def rs_compose_add(p1, p2): + """ + compute the composed sum ``prod(p2(x - beta) for beta root of p1)`` + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + >>> from sympy.polys.ring_series import rs_compose_add + >>> R, x = ring('x', QQ) + >>> f = x**2 - 2 + >>> g = x**2 - 3 + >>> rs_compose_add(f, g) + x**4 - 10*x**2 + 1 + + References + ========== + + .. [1] A. Bostan, P. Flajolet, B. Salvy and E. Schost + "Fast Computation with Two Algebraic Numbers", + (2002) Research Report 4579, Institut + National de Recherche en Informatique et en Automatique + """ + R = p1.ring + x = R.gens[0] + prec = p1.degree()*p2.degree() + 1 + np1 = rs_newton(p1, x, prec) + np1e = rs_hadamard_exp(np1) + np2 = rs_newton(p2, x, prec) + np2e = rs_hadamard_exp(np2) + np3e = rs_mul(np1e, np2e, x, prec) + np3 = rs_hadamard_exp(np3e, True) + np3a = (np3[(0,)] - np3) / x + q = rs_integrate(np3a, x) + q = rs_exp(q, x, prec) + q = _invert_monoms(q) + q = q.primitive()[1] + dp = p1.degree()*p2.degree() - q.degree() + # `dp` is the multiplicity of the zeroes of the resultant; + # these zeroes are missed in this computation so they are put here. + # if p1 and p2 are monic irreducible polynomials, + # there are zeroes in the resultant + # if and only if p1 = p2 ; in fact in that case p1 and p2 have a + # root in common, so gcd(p1, p2) != 1; being p1 and p2 irreducible + # this means p1 = p2 + if dp: + q = q*x**dp + return q + + +_convert_func = { + 'sin': 'rs_sin', + 'cos': 'rs_cos', + 'exp': 'rs_exp', + 'tan': 'rs_tan', + 'log': 'rs_log', + 'atan': 'rs_atan', + 'sinh': 'rs_sinh', + 'cosh': 'rs_cosh', + 'tanh': 'rs_tanh' + } + +def rs_min_pow(expr, series_rs, a): + """Find the minimum power of `a` in the series expansion of expr""" + series = 0 + n = 2 + while series == 0: + series = _rs_series(expr, series_rs, a, n) + n *= 2 + R = series.ring + a = R(a) + i = R.gens.index(a) + return min(series, key=lambda t: t[i])[i] + + +def _rs_series(expr, series_rs, a, prec): + # TODO Use _parallel_dict_from_expr instead of sring as sring is + # inefficient. For details, read the todo in sring. + args = expr.args + R = series_rs.ring + + # expr does not contain any function to be expanded + if not any(arg.has(Function) for arg in args) and not expr.is_Function: + return series_rs + + if not expr.has(a): + return series_rs + + elif expr.is_Function: + arg = args[0] + if len(args) > 1: + raise NotImplementedError + R1, series = sring(arg, domain=QQ, expand=False, series=True) + series_inner = _rs_series(arg, series, a, prec) + + # Why do we need to compose these three rings? + # + # We want to use a simple domain (like ``QQ`` or ``RR``) but they don't + # support symbolic coefficients. We need a ring that for example lets + # us have `sin(1)` and `cos(1)` as coefficients if we are expanding + # `sin(x + 1)`. The ``EX`` domain allows all symbolic coefficients, but + # that makes it very complex and hence slow. + # + # To solve this problem, we add only those symbolic elements as + # generators to our ring, that we need. Here, series_inner might + # involve terms like `sin(4)`, `exp(a)`, etc, which are not there in + # R1 or R. Hence, we compose these three rings to create one that has + # the generators of all three. + R = R.compose(R1).compose(series_inner.ring) + series_inner = series_inner.set_ring(R) + series = eval(_convert_func[str(expr.func)])(series_inner, + R(a), prec) + return series + + elif expr.is_Mul: + n = len(args) + for arg in args: # XXX Looks redundant + if not arg.is_Number: + R1, _ = sring(arg, expand=False, series=True) + R = R.compose(R1) + min_pows = list(map(rs_min_pow, args, [R(arg) for arg in args], + [a]*len(args))) + sum_pows = sum(min_pows) + series = R(1) + + for i in range(n): + _series = _rs_series(args[i], R(args[i]), a, ceiling(prec + - sum_pows + min_pows[i])) + R = R.compose(_series.ring) + _series = _series.set_ring(R) + series = series.set_ring(R) + series *= _series + series = rs_trunc(series, R(a), prec) + return series + + elif expr.is_Add: + n = len(args) + series = R(0) + for i in range(n): + _series = _rs_series(args[i], R(args[i]), a, prec) + R = R.compose(_series.ring) + _series = _series.set_ring(R) + series = series.set_ring(R) + series += _series + return series + + elif expr.is_Pow: + R1, _ = sring(expr.base, domain=QQ, expand=False, series=True) + R = R.compose(R1) + series_inner = _rs_series(expr.base, R(expr.base), a, prec) + return rs_pow(series_inner, expr.exp, series_inner.ring(a), prec) + + # The `is_constant` method is buggy hence we check it at the end. + # See issue #9786 for details. + elif isinstance(expr, Expr) and expr.is_constant(): + return sring(expr, domain=QQ, expand=False, series=True)[1] + + else: + raise NotImplementedError + +def rs_series(expr, a, prec): + """Return the series expansion of an expression about 0. + + Parameters + ========== + + expr : :class:`~.Expr` + a : :class:`~.Symbol` with respect to which expr is to be expanded + prec : order of the series expansion + + Currently supports multivariate Taylor series expansion. This is much + faster that SymPy's series method as it uses sparse polynomial operations. + + It automatically creates the simplest ring required to represent the series + expansion through repeated calls to sring. + + Examples + ======== + + >>> from sympy.polys.ring_series import rs_series + >>> from sympy import sin, cos, exp, tan, symbols, QQ + >>> a, b, c = symbols('a, b, c') + >>> rs_series(sin(a) + exp(a), a, 5) + 1/24*a**4 + 1/2*a**2 + 2*a + 1 + >>> series = rs_series(tan(a + b)*cos(a + c), a, 2) + >>> series.as_expr() + -a*sin(c)*tan(b) + a*cos(c)*tan(b)**2 + a*cos(c) + cos(c)*tan(b) + >>> series = rs_series(exp(a**QQ(1,3) + a**QQ(2, 5)), a, 1) + >>> series.as_expr() + a**(11/15) + a**(4/5)/2 + a**(2/5) + a**(2/3)/2 + a**(1/3) + 1 + + """ + R, series = sring(expr, domain=QQ, expand=False, series=True) + if a not in R.symbols: + R = R.add_gens([a, ]) + series = series.set_ring(R) + series = _rs_series(expr, series, a, prec) + R = series.ring + gen = R(a) + prec_got = series.degree(gen) + 1 + + if prec_got >= prec: + return rs_trunc(series, gen, prec) + else: + # increase the requested number of terms to get the desired + # number keep increasing (up to 9) until the received order + # is different than the original order and then predict how + # many additional terms are needed + for more in range(1, 9): + p1 = _rs_series(expr, series, a, prec=prec + more) + gen = gen.set_ring(p1.ring) + new_prec = p1.degree(gen) + 1 + if new_prec != prec_got: + prec_do = ceiling(prec + (prec - prec_got)*more/(new_prec - + prec_got)) + p1 = _rs_series(expr, series, a, prec=prec_do) + while p1.degree(gen) + 1 < prec: + p1 = _rs_series(expr, series, a, prec=prec_do) + gen = gen.set_ring(p1.ring) + prec_do *= 2 + break + else: + break + else: + raise ValueError('Could not calculate %s terms for %s' + % (str(prec), expr)) + return rs_trunc(p1, gen, prec) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rings.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rings.py new file mode 100644 index 0000000000000000000000000000000000000000..9df84dcf1691ac9bcd4aa01a85ca34b7ffc53e5d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rings.py @@ -0,0 +1,3096 @@ +"""Sparse polynomial rings. """ + +from __future__ import annotations + +from operator import add, mul, lt, le, gt, ge +from functools import reduce +from types import GeneratorType + +from sympy.core.cache import cacheit +from sympy.core.expr import Expr +from sympy.core.intfunc import igcd +from sympy.core.symbol import Symbol, symbols as _symbols +from sympy.core.sympify import CantSympify, sympify +from sympy.ntheory.multinomial import multinomial_coefficients +from sympy.polys.compatibility import IPolys +from sympy.polys.constructor import construct_domain +from sympy.polys.densebasic import ninf, dmp_to_dict, dmp_from_dict +from sympy.polys.domains.domain import Domain +from sympy.polys.domains.domainelement import DomainElement +from sympy.polys.domains.polynomialring import PolynomialRing +from sympy.polys.heuristicgcd import heugcd +from sympy.polys.monomials import MonomialOps +from sympy.polys.orderings import lex, MonomialOrder +from sympy.polys.polyerrors import ( + CoercionFailed, GeneratorsError, + ExactQuotientFailed, MultivariatePolynomialError) +from sympy.polys.polyoptions import (Domain as DomainOpt, + Order as OrderOpt, build_options) +from sympy.polys.polyutils import (expr_from_dict, _dict_reorder, + _parallel_dict_from_expr) +from sympy.printing.defaults import DefaultPrinting +from sympy.utilities import public, subsets +from sympy.utilities.iterables import is_sequence +from sympy.utilities.magic import pollute + +@public +def ring(symbols, domain, order: MonomialOrder|str = lex): + """Construct a polynomial ring returning ``(ring, x_1, ..., x_n)``. + + Parameters + ========== + + symbols : str + Symbol/Expr or sequence of str, Symbol/Expr (non-empty) + domain : :class:`~.Domain` or coercible + order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex`` + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex + + >>> R, x, y, z = ring("x,y,z", ZZ, lex) + >>> R + Polynomial ring in x, y, z over ZZ with lex order + >>> x + y + z + x + y + z + >>> type(_) + + + """ + _ring = PolyRing(symbols, domain, order) + return (_ring,) + _ring.gens + +@public +def xring(symbols, domain, order=lex): + """Construct a polynomial ring returning ``(ring, (x_1, ..., x_n))``. + + Parameters + ========== + + symbols : str + Symbol/Expr or sequence of str, Symbol/Expr (non-empty) + domain : :class:`~.Domain` or coercible + order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex`` + + Examples + ======== + + >>> from sympy.polys.rings import xring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex + + >>> R, (x, y, z) = xring("x,y,z", ZZ, lex) + >>> R + Polynomial ring in x, y, z over ZZ with lex order + >>> x + y + z + x + y + z + >>> type(_) + + + """ + _ring = PolyRing(symbols, domain, order) + return (_ring, _ring.gens) + +@public +def vring(symbols, domain, order=lex): + """Construct a polynomial ring and inject ``x_1, ..., x_n`` into the global namespace. + + Parameters + ========== + + symbols : str + Symbol/Expr or sequence of str, Symbol/Expr (non-empty) + domain : :class:`~.Domain` or coercible + order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex`` + + Examples + ======== + + >>> from sympy.polys.rings import vring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex + + >>> vring("x,y,z", ZZ, lex) + Polynomial ring in x, y, z over ZZ with lex order + >>> x + y + z # noqa: + x + y + z + >>> type(_) + + + """ + _ring = PolyRing(symbols, domain, order) + pollute([ sym.name for sym in _ring.symbols ], _ring.gens) + return _ring + +@public +def sring(exprs, *symbols, **options): + """Construct a ring deriving generators and domain from options and input expressions. + + Parameters + ========== + + exprs : :class:`~.Expr` or sequence of :class:`~.Expr` (sympifiable) + symbols : sequence of :class:`~.Symbol`/:class:`~.Expr` + options : keyword arguments understood by :class:`~.Options` + + Examples + ======== + + >>> from sympy import sring, symbols + + >>> x, y, z = symbols("x,y,z") + >>> R, f = sring(x + 2*y + 3*z) + >>> R + Polynomial ring in x, y, z over ZZ with lex order + >>> f + x + 2*y + 3*z + >>> type(_) + + + """ + single = False + + if not is_sequence(exprs): + exprs, single = [exprs], True + + exprs = list(map(sympify, exprs)) + opt = build_options(symbols, options) + + # TODO: rewrite this so that it doesn't use expand() (see poly()). + reps, opt = _parallel_dict_from_expr(exprs, opt) + + if opt.domain is None: + coeffs = sum([ list(rep.values()) for rep in reps ], []) + + opt.domain, coeffs_dom = construct_domain(coeffs, opt=opt) + + coeff_map = dict(zip(coeffs, coeffs_dom)) + reps = [{m: coeff_map[c] for m, c in rep.items()} for rep in reps] + + _ring = PolyRing(opt.gens, opt.domain, opt.order) + polys = list(map(_ring.from_dict, reps)) + + if single: + return (_ring, polys[0]) + else: + return (_ring, polys) + +def _parse_symbols(symbols): + if isinstance(symbols, str): + return _symbols(symbols, seq=True) if symbols else () + elif isinstance(symbols, Expr): + return (symbols,) + elif is_sequence(symbols): + if all(isinstance(s, str) for s in symbols): + return _symbols(symbols) + elif all(isinstance(s, Expr) for s in symbols): + return symbols + + raise GeneratorsError("expected a string, Symbol or expression or a non-empty sequence of strings, Symbols or expressions") + + +class PolyRing(DefaultPrinting, IPolys): + """Multivariate distributed polynomial ring. """ + + gens: tuple[PolyElement, ...] + symbols: tuple[Expr, ...] + ngens: int + domain: Domain + order: MonomialOrder + + def __new__(cls, symbols, domain, order=lex): + symbols = tuple(_parse_symbols(symbols)) + ngens = len(symbols) + domain = DomainOpt.preprocess(domain) + order = OrderOpt.preprocess(order) + + _hash_tuple = (cls.__name__, symbols, ngens, domain, order) + + if domain.is_Composite and set(symbols) & set(domain.symbols): + raise GeneratorsError("polynomial ring and it's ground domain share generators") + + obj = object.__new__(cls) + obj._hash_tuple = _hash_tuple + obj._hash = hash(_hash_tuple) + obj.symbols = symbols + obj.ngens = ngens + obj.domain = domain + obj.order = order + + obj.dtype = PolyElement(obj, ()).new + + obj.zero_monom = (0,)*ngens + obj.gens = obj._gens() + obj._gens_set = set(obj.gens) + + obj._one = [(obj.zero_monom, domain.one)] + + if ngens: + # These expect monomials in at least one variable + codegen = MonomialOps(ngens) + obj.monomial_mul = codegen.mul() + obj.monomial_pow = codegen.pow() + obj.monomial_mulpow = codegen.mulpow() + obj.monomial_ldiv = codegen.ldiv() + obj.monomial_div = codegen.div() + obj.monomial_lcm = codegen.lcm() + obj.monomial_gcd = codegen.gcd() + else: + monunit = lambda a, b: () + obj.monomial_mul = monunit + obj.monomial_pow = monunit + obj.monomial_mulpow = lambda a, b, c: () + obj.monomial_ldiv = monunit + obj.monomial_div = monunit + obj.monomial_lcm = monunit + obj.monomial_gcd = monunit + + + if order is lex: + obj.leading_expv = max + else: + obj.leading_expv = lambda f: max(f, key=order) + + for symbol, generator in zip(obj.symbols, obj.gens): + if isinstance(symbol, Symbol): + name = symbol.name + + if not hasattr(obj, name): + setattr(obj, name, generator) + + return obj + + def _gens(self): + """Return a list of polynomial generators. """ + one = self.domain.one + _gens = [] + for i in range(self.ngens): + expv = self.monomial_basis(i) + poly = self.zero + poly[expv] = one + _gens.append(poly) + return tuple(_gens) + + def __getnewargs__(self): + return (self.symbols, self.domain, self.order) + + def __getstate__(self): + state = self.__dict__.copy() + del state["leading_expv"] + + for key in state: + if key.startswith("monomial_"): + del state[key] + + return state + + def __hash__(self): + return self._hash + + def __eq__(self, other): + return isinstance(other, PolyRing) and \ + (self.symbols, self.domain, self.ngens, self.order) == \ + (other.symbols, other.domain, other.ngens, other.order) + + def __ne__(self, other): + return not self == other + + def clone(self, symbols=None, domain=None, order=None): + # Need a hashable tuple for cacheit to work + if symbols is not None and isinstance(symbols, list): + symbols = tuple(symbols) + return self._clone(symbols, domain, order) + + @cacheit + def _clone(self, symbols, domain, order): + return self.__class__(symbols or self.symbols, domain or self.domain, order or self.order) + + def monomial_basis(self, i): + """Return the ith-basis element. """ + basis = [0]*self.ngens + basis[i] = 1 + return tuple(basis) + + @property + def zero(self): + return self.dtype([]) + + @property + def one(self): + return self.dtype(self._one) + + def is_element(self, element): + """True if ``element`` is an element of this ring. False otherwise. """ + return isinstance(element, PolyElement) and element.ring == self + + def domain_new(self, element, orig_domain=None): + return self.domain.convert(element, orig_domain) + + def ground_new(self, coeff): + return self.term_new(self.zero_monom, coeff) + + def term_new(self, monom, coeff): + coeff = self.domain_new(coeff) + poly = self.zero + if coeff: + poly[monom] = coeff + return poly + + def ring_new(self, element): + if isinstance(element, PolyElement): + if self == element.ring: + return element + elif isinstance(self.domain, PolynomialRing) and self.domain.ring == element.ring: + return self.ground_new(element) + else: + raise NotImplementedError("conversion") + elif isinstance(element, str): + raise NotImplementedError("parsing") + elif isinstance(element, dict): + return self.from_dict(element) + elif isinstance(element, list): + try: + return self.from_terms(element) + except ValueError: + return self.from_list(element) + elif isinstance(element, Expr): + return self.from_expr(element) + else: + return self.ground_new(element) + + __call__ = ring_new + + def from_dict(self, element, orig_domain=None): + domain_new = self.domain_new + poly = self.zero + + for monom, coeff in element.items(): + coeff = domain_new(coeff, orig_domain) + if coeff: + poly[monom] = coeff + + return poly + + def from_terms(self, element, orig_domain=None): + return self.from_dict(dict(element), orig_domain) + + def from_list(self, element): + return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain)) + + def _rebuild_expr(self, expr, mapping): + domain = self.domain + + def _rebuild(expr): + generator = mapping.get(expr) + + if generator is not None: + return generator + elif expr.is_Add: + return reduce(add, list(map(_rebuild, expr.args))) + elif expr.is_Mul: + return reduce(mul, list(map(_rebuild, expr.args))) + else: + # XXX: Use as_base_exp() to handle Pow(x, n) and also exp(n) + # XXX: E can be a generator e.g. sring([exp(2)]) -> ZZ[E] + base, exp = expr.as_base_exp() + if exp.is_Integer and exp > 1: + return _rebuild(base)**int(exp) + else: + return self.ground_new(domain.convert(expr)) + + return _rebuild(sympify(expr)) + + def from_expr(self, expr): + mapping = dict(list(zip(self.symbols, self.gens))) + + try: + poly = self._rebuild_expr(expr, mapping) + except CoercionFailed: + raise ValueError("expected an expression convertible to a polynomial in %s, got %s" % (self, expr)) + else: + return self.ring_new(poly) + + def index(self, gen): + """Compute index of ``gen`` in ``self.gens``. """ + if gen is None: + if self.ngens: + i = 0 + else: + i = -1 # indicate impossible choice + elif isinstance(gen, int): + i = gen + + if 0 <= i and i < self.ngens: + pass + elif -self.ngens <= i and i <= -1: + i = -i - 1 + else: + raise ValueError("invalid generator index: %s" % gen) + elif self.is_element(gen): + try: + i = self.gens.index(gen) + except ValueError: + raise ValueError("invalid generator: %s" % gen) + elif isinstance(gen, str): + try: + i = self.symbols.index(gen) + except ValueError: + raise ValueError("invalid generator: %s" % gen) + else: + raise ValueError("expected a polynomial generator, an integer, a string or None, got %s" % gen) + + return i + + def drop(self, *gens): + """Remove specified generators from this ring. """ + indices = set(map(self.index, gens)) + symbols = [ s for i, s in enumerate(self.symbols) if i not in indices ] + + if not symbols: + return self.domain + else: + return self.clone(symbols=symbols) + + def __getitem__(self, key): + symbols = self.symbols[key] + + if not symbols: + return self.domain + else: + return self.clone(symbols=symbols) + + def to_ground(self): + # TODO: should AlgebraicField be a Composite domain? + if self.domain.is_Composite or hasattr(self.domain, 'domain'): + return self.clone(domain=self.domain.domain) + else: + raise ValueError("%s is not a composite domain" % self.domain) + + def to_domain(self): + return PolynomialRing(self) + + def to_field(self): + from sympy.polys.fields import FracField + return FracField(self.symbols, self.domain, self.order) + + @property + def is_univariate(self): + return len(self.gens) == 1 + + @property + def is_multivariate(self): + return len(self.gens) > 1 + + def add(self, *objs): + """ + Add a sequence of polynomials or containers of polynomials. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> R, x = ring("x", ZZ) + >>> R.add([ x**2 + 2*i + 3 for i in range(4) ]) + 4*x**2 + 24 + >>> _.factor_list() + (4, [(x**2 + 6, 1)]) + + """ + p = self.zero + + for obj in objs: + if is_sequence(obj, include=GeneratorType): + p += self.add(*obj) + else: + p += obj + + return p + + def mul(self, *objs): + """ + Multiply a sequence of polynomials or containers of polynomials. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> R, x = ring("x", ZZ) + >>> R.mul([ x**2 + 2*i + 3 for i in range(4) ]) + x**8 + 24*x**6 + 206*x**4 + 744*x**2 + 945 + >>> _.factor_list() + (1, [(x**2 + 3, 1), (x**2 + 5, 1), (x**2 + 7, 1), (x**2 + 9, 1)]) + + """ + p = self.one + + for obj in objs: + if is_sequence(obj, include=GeneratorType): + p *= self.mul(*obj) + else: + p *= obj + + return p + + def drop_to_ground(self, *gens): + r""" + Remove specified generators from the ring and inject them into + its domain. + """ + indices = set(map(self.index, gens)) + symbols = [s for i, s in enumerate(self.symbols) if i not in indices] + gens = [gen for i, gen in enumerate(self.gens) if i not in indices] + + if not symbols: + return self + else: + return self.clone(symbols=symbols, domain=self.drop(*gens)) + + def compose(self, other): + """Add the generators of ``other`` to ``self``""" + if self != other: + syms = set(self.symbols).union(set(other.symbols)) + return self.clone(symbols=list(syms)) + else: + return self + + def add_gens(self, symbols): + """Add the elements of ``symbols`` as generators to ``self``""" + syms = set(self.symbols).union(set(symbols)) + return self.clone(symbols=list(syms)) + + def symmetric_poly(self, n): + """ + Return the elementary symmetric polynomial of degree *n* over + this ring's generators. + """ + if n < 0 or n > self.ngens: + raise ValueError("Cannot generate symmetric polynomial of order %s for %s" % (n, self.gens)) + elif not n: + return self.one + else: + poly = self.zero + for s in subsets(range(self.ngens), int(n)): + monom = tuple(int(i in s) for i in range(self.ngens)) + poly += self.term_new(monom, self.domain.one) + return poly + + +class PolyElement(DomainElement, DefaultPrinting, CantSympify, dict): + """Element of multivariate distributed polynomial ring. """ + + def __init__(self, ring, init): + super().__init__(init) + self.ring = ring + # This check would be too slow to run every time: + # self._check() + + def _check(self): + assert isinstance(self, PolyElement) + assert isinstance(self.ring, PolyRing) + dom = self.ring.domain + assert isinstance(dom, Domain) + for monom, coeff in self.items(): + assert dom.of_type(coeff) + assert len(monom) == self.ring.ngens + assert all(isinstance(exp, int) and exp >= 0 for exp in monom) + + def new(self, init): + return self.__class__(self.ring, init) + + def parent(self): + return self.ring.to_domain() + + def __getnewargs__(self): + return (self.ring, list(self.iterterms())) + + _hash = None + + def __hash__(self): + # XXX: This computes a hash of a dictionary, but currently we don't + # protect dictionary from being changed so any use site modifications + # will make hashing go wrong. Use this feature with caution until we + # figure out how to make a safe API without compromising speed of this + # low-level class. + _hash = self._hash + if _hash is None: + self._hash = _hash = hash((self.ring, frozenset(self.items()))) + return _hash + + def copy(self): + """Return a copy of polynomial self. + + Polynomials are mutable; if one is interested in preserving + a polynomial, and one plans to use inplace operations, one + can copy the polynomial. This method makes a shallow copy. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> R, x, y = ring('x, y', ZZ) + >>> p = (x + y)**2 + >>> p1 = p.copy() + >>> p2 = p + >>> p[R.zero_monom] = 3 + >>> p + x**2 + 2*x*y + y**2 + 3 + >>> p1 + x**2 + 2*x*y + y**2 + >>> p2 + x**2 + 2*x*y + y**2 + 3 + + """ + return self.new(self) + + def set_ring(self, new_ring): + if self.ring == new_ring: + return self + elif self.ring.symbols != new_ring.symbols: + terms = list(zip(*_dict_reorder(self, self.ring.symbols, new_ring.symbols))) + return new_ring.from_terms(terms, self.ring.domain) + else: + return new_ring.from_dict(self, self.ring.domain) + + def as_expr(self, *symbols): + if not symbols: + symbols = self.ring.symbols + elif len(symbols) != self.ring.ngens: + raise ValueError( + "Wrong number of symbols, expected %s got %s" % + (self.ring.ngens, len(symbols)) + ) + + return expr_from_dict(self.as_expr_dict(), *symbols) + + def as_expr_dict(self): + to_sympy = self.ring.domain.to_sympy + return {monom: to_sympy(coeff) for monom, coeff in self.iterterms()} + + def clear_denoms(self): + domain = self.ring.domain + + if not domain.is_Field or not domain.has_assoc_Ring: + return domain.one, self + + ground_ring = domain.get_ring() + common = ground_ring.one + lcm = ground_ring.lcm + denom = domain.denom + + for coeff in self.values(): + common = lcm(common, denom(coeff)) + + poly = self.new([ (k, v*common) for k, v in self.items() ]) + return common, poly + + def strip_zero(self): + """Eliminate monomials with zero coefficient. """ + for k, v in list(self.items()): + if not v: + del self[k] + + def __eq__(p1, p2): + """Equality test for polynomials. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> p1 = (x + y)**2 + (x - y)**2 + >>> p1 == 4*x*y + False + >>> p1 == 2*(x**2 + y**2) + True + + """ + if not p2: + return not p1 + elif p1.ring.is_element(p2): + return dict.__eq__(p1, p2) + elif len(p1) > 1: + return False + else: + return p1.get(p1.ring.zero_monom) == p2 + + def __ne__(p1, p2): + return not p1 == p2 + + def almosteq(p1, p2, tolerance=None): + """Approximate equality test for polynomials. """ + ring = p1.ring + + if ring.is_element(p2): + if set(p1.keys()) != set(p2.keys()): + return False + + almosteq = ring.domain.almosteq + + for k in p1.keys(): + if not almosteq(p1[k], p2[k], tolerance): + return False + return True + elif len(p1) > 1: + return False + else: + try: + p2 = ring.domain.convert(p2) + except CoercionFailed: + return False + else: + return ring.domain.almosteq(p1.const(), p2, tolerance) + + def sort_key(self): + return (len(self), self.terms()) + + def _cmp(p1, p2, op): + if p1.ring.is_element(p2): + return op(p1.sort_key(), p2.sort_key()) + else: + return NotImplemented + + def __lt__(p1, p2): + return p1._cmp(p2, lt) + def __le__(p1, p2): + return p1._cmp(p2, le) + def __gt__(p1, p2): + return p1._cmp(p2, gt) + def __ge__(p1, p2): + return p1._cmp(p2, ge) + + def _drop(self, gen): + ring = self.ring + i = ring.index(gen) + + if ring.ngens == 1: + return i, ring.domain + else: + symbols = list(ring.symbols) + del symbols[i] + return i, ring.clone(symbols=symbols) + + def drop(self, gen): + i, ring = self._drop(gen) + + if self.ring.ngens == 1: + if self.is_ground: + return self.coeff(1) + else: + raise ValueError("Cannot drop %s" % gen) + else: + poly = ring.zero + + for k, v in self.items(): + if k[i] == 0: + K = list(k) + del K[i] + poly[tuple(K)] = v + else: + raise ValueError("Cannot drop %s" % gen) + + return poly + + def _drop_to_ground(self, gen): + ring = self.ring + i = ring.index(gen) + + symbols = list(ring.symbols) + del symbols[i] + return i, ring.clone(symbols=symbols, domain=ring[i]) + + def drop_to_ground(self, gen): + if self.ring.ngens == 1: + raise ValueError("Cannot drop only generator to ground") + + i, ring = self._drop_to_ground(gen) + poly = ring.zero + gen = ring.domain.gens[0] + + for monom, coeff in self.iterterms(): + mon = monom[:i] + monom[i+1:] + if mon not in poly: + poly[mon] = (gen**monom[i]).mul_ground(coeff) + else: + poly[mon] += (gen**monom[i]).mul_ground(coeff) + + return poly + + def to_dense(self): + return dmp_from_dict(self, self.ring.ngens-1, self.ring.domain) + + def to_dict(self): + return dict(self) + + def str(self, printer, precedence, exp_pattern, mul_symbol): + if not self: + return printer._print(self.ring.domain.zero) + prec_mul = precedence["Mul"] + prec_atom = precedence["Atom"] + ring = self.ring + symbols = ring.symbols + ngens = ring.ngens + zm = ring.zero_monom + sexpvs = [] + for expv, coeff in self.terms(): + negative = ring.domain.is_negative(coeff) + sign = " - " if negative else " + " + sexpvs.append(sign) + if expv == zm: + scoeff = printer._print(coeff) + if negative and scoeff.startswith("-"): + scoeff = scoeff[1:] + else: + if negative: + coeff = -coeff + if coeff != self.ring.domain.one: + scoeff = printer.parenthesize(coeff, prec_mul, strict=True) + else: + scoeff = '' + sexpv = [] + for i in range(ngens): + exp = expv[i] + if not exp: + continue + symbol = printer.parenthesize(symbols[i], prec_atom, strict=True) + if exp != 1: + if exp != int(exp) or exp < 0: + sexp = printer.parenthesize(exp, prec_atom, strict=False) + else: + sexp = exp + sexpv.append(exp_pattern % (symbol, sexp)) + else: + sexpv.append('%s' % symbol) + if scoeff: + sexpv = [scoeff] + sexpv + sexpvs.append(mul_symbol.join(sexpv)) + if sexpvs[0] in [" + ", " - "]: + head = sexpvs.pop(0) + if head == " - ": + sexpvs.insert(0, "-") + return "".join(sexpvs) + + @property + def is_generator(self): + return self in self.ring._gens_set + + @property + def is_ground(self): + return not self or (len(self) == 1 and self.ring.zero_monom in self) + + @property + def is_monomial(self): + return not self or (len(self) == 1 and self.LC == 1) + + @property + def is_term(self): + return len(self) <= 1 + + @property + def is_negative(self): + return self.ring.domain.is_negative(self.LC) + + @property + def is_positive(self): + return self.ring.domain.is_positive(self.LC) + + @property + def is_nonnegative(self): + return self.ring.domain.is_nonnegative(self.LC) + + @property + def is_nonpositive(self): + return self.ring.domain.is_nonpositive(self.LC) + + @property + def is_zero(f): + return not f + + @property + def is_one(f): + return f == f.ring.one + + @property + def is_monic(f): + return f.ring.domain.is_one(f.LC) + + @property + def is_primitive(f): + return f.ring.domain.is_one(f.content()) + + @property + def is_linear(f): + return all(sum(monom) <= 1 for monom in f.itermonoms()) + + @property + def is_quadratic(f): + return all(sum(monom) <= 2 for monom in f.itermonoms()) + + @property + def is_squarefree(f): + if not f.ring.ngens: + return True + return f.ring.dmp_sqf_p(f) + + @property + def is_irreducible(f): + if not f.ring.ngens: + return True + return f.ring.dmp_irreducible_p(f) + + @property + def is_cyclotomic(f): + if f.ring.is_univariate: + return f.ring.dup_cyclotomic_p(f) + else: + raise MultivariatePolynomialError("cyclotomic polynomial") + + def __neg__(self): + return self.new([ (monom, -coeff) for monom, coeff in self.iterterms() ]) + + def __pos__(self): + return self + + def __add__(p1, p2): + """Add two polynomials. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> (x + y)**2 + (x - y)**2 + 2*x**2 + 2*y**2 + + """ + if not p2: + return p1.copy() + ring = p1.ring + if ring.is_element(p2): + p = p1.copy() + get = p.get + zero = ring.domain.zero + for k, v in p2.items(): + v = get(k, zero) + v + if v: + p[k] = v + else: + del p[k] + return p + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__radd__(p1) + else: + return NotImplemented + + try: + cp2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + p = p1.copy() + if not cp2: + return p + zm = ring.zero_monom + if zm not in p1.keys(): + p[zm] = cp2 + else: + if p2 == -p[zm]: + del p[zm] + else: + p[zm] += cp2 + return p + + def __radd__(p1, n): + p = p1.copy() + if not n: + return p + ring = p1.ring + try: + n = ring.domain_new(n) + except CoercionFailed: + return NotImplemented + else: + zm = ring.zero_monom + if zm not in p1.keys(): + p[zm] = n + else: + if n == -p[zm]: + del p[zm] + else: + p[zm] += n + return p + + def __sub__(p1, p2): + """Subtract polynomial p2 from p1. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> p1 = x + y**2 + >>> p2 = x*y + y**2 + >>> p1 - p2 + -x*y + x + + """ + if not p2: + return p1.copy() + ring = p1.ring + if ring.is_element(p2): + p = p1.copy() + get = p.get + zero = ring.domain.zero + for k, v in p2.items(): + v = get(k, zero) - v + if v: + p[k] = v + else: + del p[k] + return p + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rsub__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + p = p1.copy() + zm = ring.zero_monom + if zm not in p1.keys(): + p[zm] = -p2 + else: + if p2 == p[zm]: + del p[zm] + else: + p[zm] -= p2 + return p + + def __rsub__(p1, n): + """n - p1 with n convertible to the coefficient domain. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x + y + >>> 4 - p + -x - y + 4 + + """ + ring = p1.ring + try: + n = ring.domain_new(n) + except CoercionFailed: + return NotImplemented + else: + p = ring.zero + for expv in p1: + p[expv] = -p1[expv] + p += n + # p._check() + return p + + def __mul__(p1, p2): + """Multiply two polynomials. + + Examples + ======== + + >>> from sympy.polys.domains import QQ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', QQ) + >>> p1 = x + y + >>> p2 = x - y + >>> p1*p2 + x**2 - y**2 + + """ + ring = p1.ring + p = ring.zero + if not p1 or not p2: + return p + elif ring.is_element(p2): + get = p.get + zero = ring.domain.zero + monomial_mul = ring.monomial_mul + p2it = list(p2.items()) + for exp1, v1 in p1.items(): + for exp2, v2 in p2it: + exp = monomial_mul(exp1, exp2) + p[exp] = get(exp, zero) + v1*v2 + p.strip_zero() + # p._check() + return p + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rmul__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + for exp1, v1 in p1.items(): + v = v1*p2 + if v: + p[exp1] = v + # p._check() + return p + + def __rmul__(p1, p2): + """p2 * p1 with p2 in the coefficient domain of p1. + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x + y + >>> 4 * p + 4*x + 4*y + + """ + p = p1.ring.zero + if not p2: + return p + try: + p2 = p.ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + for exp1, v1 in p1.items(): + v = p2*v1 + if v: + p[exp1] = v + return p + + def __pow__(self, n): + """raise polynomial to power `n` + + Examples + ======== + + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.rings import ring + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x + y**2 + >>> p**3 + x**3 + 3*x**2*y**2 + 3*x*y**4 + y**6 + + """ + if not isinstance(n, int): + raise TypeError("exponent must be an integer, got %s" % n) + elif n < 0: + raise ValueError("exponent must be a non-negative integer, got %s" % n) + + ring = self.ring + + if not n: + if self: + return ring.one + else: + raise ValueError("0**0") + elif len(self) == 1: + monom, coeff = list(self.items())[0] + p = ring.zero + if coeff == ring.domain.one: + p[ring.monomial_pow(monom, n)] = coeff + else: + p[ring.monomial_pow(monom, n)] = coeff**n + # p._check() + return p + + # For ring series, we need negative and rational exponent support only + # with monomials. + n = int(n) + if n < 0: + raise ValueError("Negative exponent") + + elif n == 1: + return self.copy() + elif n == 2: + return self.square() + elif n == 3: + return self*self.square() + elif len(self) <= 5: # TODO: use an actual density measure + return self._pow_multinomial(n) + else: + return self._pow_generic(n) + + def _pow_generic(self, n): + p = self.ring.one + c = self + + while True: + if n & 1: + p = p*c + n -= 1 + if not n: + break + + c = c.square() + n = n // 2 + + return p + + def _pow_multinomial(self, n): + multinomials = multinomial_coefficients(len(self), n).items() + monomial_mulpow = self.ring.monomial_mulpow + zero_monom = self.ring.zero_monom + terms = self.items() + zero = self.ring.domain.zero + poly = self.ring.zero + + for multinomial, multinomial_coeff in multinomials: + product_monom = zero_monom + product_coeff = multinomial_coeff + + for exp, (monom, coeff) in zip(multinomial, terms): + if exp: + product_monom = monomial_mulpow(product_monom, monom, exp) + product_coeff *= coeff**exp + + monom = tuple(product_monom) + coeff = product_coeff + + coeff = poly.get(monom, zero) + coeff + + if coeff: + poly[monom] = coeff + elif monom in poly: + del poly[monom] + + return poly + + def square(self): + """square of a polynomial + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x + y**2 + >>> p.square() + x**2 + 2*x*y**2 + y**4 + + """ + ring = self.ring + p = ring.zero + get = p.get + keys = list(self.keys()) + zero = ring.domain.zero + monomial_mul = ring.monomial_mul + for i in range(len(keys)): + k1 = keys[i] + pk = self[k1] + for j in range(i): + k2 = keys[j] + exp = monomial_mul(k1, k2) + p[exp] = get(exp, zero) + pk*self[k2] + p = p.imul_num(2) + get = p.get + for k, v in self.items(): + k2 = monomial_mul(k, k) + p[k2] = get(k2, zero) + v**2 + p.strip_zero() + # p._check() + return p + + def __divmod__(p1, p2): + ring = p1.ring + + if not p2: + raise ZeroDivisionError("polynomial division") + elif ring.is_element(p2): + return p1.div(p2) + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rdivmod__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + return (p1.quo_ground(p2), p1.rem_ground(p2)) + + def __rdivmod__(p1, p2): + ring = p1.ring + try: + p2 = ring.ground_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p2.div(p1) + + def __mod__(p1, p2): + ring = p1.ring + + if not p2: + raise ZeroDivisionError("polynomial division") + elif ring.is_element(p2): + return p1.rem(p2) + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rmod__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p1.rem_ground(p2) + + def __rmod__(p1, p2): + ring = p1.ring + try: + p2 = ring.ground_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p2.rem(p1) + + def __floordiv__(p1, p2): + ring = p1.ring + + if not p2: + raise ZeroDivisionError("polynomial division") + elif ring.is_element(p2): + return p1.quo(p2) + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rtruediv__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p1.quo_ground(p2) + + def __rfloordiv__(p1, p2): + ring = p1.ring + try: + p2 = ring.ground_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p2.quo(p1) + + def __truediv__(p1, p2): + ring = p1.ring + + if not p2: + raise ZeroDivisionError("polynomial division") + elif ring.is_element(p2): + return p1.exquo(p2) + elif isinstance(p2, PolyElement): + if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring: + pass + elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring: + return p2.__rtruediv__(p1) + else: + return NotImplemented + + try: + p2 = ring.domain_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p1.quo_ground(p2) + + def __rtruediv__(p1, p2): + ring = p1.ring + try: + p2 = ring.ground_new(p2) + except CoercionFailed: + return NotImplemented + else: + return p2.exquo(p1) + + def _term_div(self): + zm = self.ring.zero_monom + domain = self.ring.domain + domain_quo = domain.quo + monomial_div = self.ring.monomial_div + + if domain.is_Field: + def term_div(a_lm_a_lc, b_lm_b_lc): + a_lm, a_lc = a_lm_a_lc + b_lm, b_lc = b_lm_b_lc + if b_lm == zm: # apparently this is a very common case + monom = a_lm + else: + monom = monomial_div(a_lm, b_lm) + if monom is not None: + return monom, domain_quo(a_lc, b_lc) + else: + return None + else: + def term_div(a_lm_a_lc, b_lm_b_lc): + a_lm, a_lc = a_lm_a_lc + b_lm, b_lc = b_lm_b_lc + if b_lm == zm: # apparently this is a very common case + monom = a_lm + else: + monom = monomial_div(a_lm, b_lm) + if not (monom is None or a_lc % b_lc): + return monom, domain_quo(a_lc, b_lc) + else: + return None + + return term_div + + def div(self, fv): + """Division algorithm, see [CLO] p64. + + fv array of polynomials + return qv, r such that + self = sum(fv[i]*qv[i]) + r + + All polynomials are required not to be Laurent polynomials. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> f = x**3 + >>> f0 = x - y**2 + >>> f1 = x - y + >>> qv, r = f.div((f0, f1)) + >>> qv[0] + x**2 + x*y**2 + y**4 + >>> qv[1] + 0 + >>> r + y**6 + + """ + ring = self.ring + ret_single = False + if isinstance(fv, PolyElement): + ret_single = True + fv = [fv] + if not all(fv): + raise ZeroDivisionError("polynomial division") + if not self: + if ret_single: + return ring.zero, ring.zero + else: + return [], ring.zero + for f in fv: + if f.ring != ring: + raise ValueError('self and f must have the same ring') + s = len(fv) + qv = [ring.zero for i in range(s)] + p = self.copy() + r = ring.zero + term_div = self._term_div() + expvs = [fx.leading_expv() for fx in fv] + while p: + i = 0 + divoccurred = 0 + while i < s and divoccurred == 0: + expv = p.leading_expv() + term = term_div((expv, p[expv]), (expvs[i], fv[i][expvs[i]])) + if term is not None: + expv1, c = term + qv[i] = qv[i]._iadd_monom((expv1, c)) + p = p._iadd_poly_monom(fv[i], (expv1, -c)) + divoccurred = 1 + else: + i += 1 + if not divoccurred: + expv = p.leading_expv() + r = r._iadd_monom((expv, p[expv])) + del p[expv] + if expv == ring.zero_monom: + r += p + if ret_single: + if not qv: + return ring.zero, r + else: + return qv[0], r + else: + return qv, r + + def rem(self, G): + f = self + if isinstance(G, PolyElement): + G = [G] + if not all(G): + raise ZeroDivisionError("polynomial division") + ring = f.ring + domain = ring.domain + zero = domain.zero + monomial_mul = ring.monomial_mul + r = ring.zero + term_div = f._term_div() + ltf = f.LT + f = f.copy() + get = f.get + while f: + for g in G: + tq = term_div(ltf, g.LT) + if tq is not None: + m, c = tq + for mg, cg in g.iterterms(): + m1 = monomial_mul(mg, m) + c1 = get(m1, zero) - c*cg + if not c1: + del f[m1] + else: + f[m1] = c1 + ltm = f.leading_expv() + if ltm is not None: + ltf = ltm, f[ltm] + + break + else: + ltm, ltc = ltf + if ltm in r: + r[ltm] += ltc + else: + r[ltm] = ltc + del f[ltm] + ltm = f.leading_expv() + if ltm is not None: + ltf = ltm, f[ltm] + + return r + + def quo(f, G): + return f.div(G)[0] + + def exquo(f, G): + q, r = f.div(G) + + if not r: + return q + else: + raise ExactQuotientFailed(f, G) + + def _iadd_monom(self, mc): + """add to self the monomial coeff*x0**i0*x1**i1*... + unless self is a generator -- then just return the sum of the two. + + mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x**4 + 2*y + >>> m = (1, 2) + >>> p1 = p._iadd_monom((m, 5)) + >>> p1 + x**4 + 5*x*y**2 + 2*y + >>> p1 is p + True + >>> p = x + >>> p1 = p._iadd_monom((m, 5)) + >>> p1 + 5*x*y**2 + x + >>> p1 is p + False + + """ + if self in self.ring._gens_set: + cpself = self.copy() + else: + cpself = self + expv, coeff = mc + c = cpself.get(expv) + if c is None: + cpself[expv] = coeff + else: + c += coeff + if c: + cpself[expv] = c + else: + del cpself[expv] + return cpself + + def _iadd_poly_monom(self, p2, mc): + """add to self the product of (p)*(coeff*x0**i0*x1**i1*...) + unless self is a generator -- then just return the sum of the two. + + mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...) + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y, z = ring('x, y, z', ZZ) + >>> p1 = x**4 + 2*y + >>> p2 = y + z + >>> m = (1, 2, 3) + >>> p1 = p1._iadd_poly_monom(p2, (m, 3)) + >>> p1 + x**4 + 3*x*y**3*z**3 + 3*x*y**2*z**4 + 2*y + + """ + p1 = self + if p1 in p1.ring._gens_set: + p1 = p1.copy() + (m, c) = mc + get = p1.get + zero = p1.ring.domain.zero + monomial_mul = p1.ring.monomial_mul + for k, v in p2.items(): + ka = monomial_mul(k, m) + coeff = get(ka, zero) + v*c + if coeff: + p1[ka] = coeff + else: + del p1[ka] + return p1 + + def degree(f, x=None): + """ + The leading degree in ``x`` or the main variable. + + Note that the degree of 0 is negative infinity (``float('-inf')``) + + """ + i = f.ring.index(x) + + if not f: + return ninf + elif i < 0: + return 0 + else: + return max(monom[i] for monom in f.itermonoms()) + + def degrees(f): + """ + A tuple containing leading degrees in all variables. + + Note that the degree of 0 is negative infinity (``float('-inf')``) + + """ + if not f: + return (ninf,)*f.ring.ngens + else: + return tuple(map(max, list(zip(*f.itermonoms())))) + + def tail_degree(f, x=None): + """ + The tail degree in ``x`` or the main variable. + + Note that the degree of 0 is negative infinity (``float('-inf')``) + + """ + i = f.ring.index(x) + + if not f: + return ninf + elif i < 0: + return 0 + else: + return min(monom[i] for monom in f.itermonoms()) + + def tail_degrees(f): + """ + A tuple containing tail degrees in all variables. + + Note that the degree of 0 is negative infinity (``float('-inf')``) + + """ + if not f: + return (ninf,)*f.ring.ngens + else: + return tuple(map(min, list(zip(*f.itermonoms())))) + + def leading_expv(self): + """Leading monomial tuple according to the monomial ordering. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y, z = ring('x, y, z', ZZ) + >>> p = x**4 + x**3*y + x**2*z**2 + z**7 + >>> p.leading_expv() + (4, 0, 0) + + """ + if self: + return self.ring.leading_expv(self) + else: + return None + + def _get_coeff(self, expv): + return self.get(expv, self.ring.domain.zero) + + def coeff(self, element): + """ + Returns the coefficient that stands next to the given monomial. + + Parameters + ========== + + element : PolyElement (with ``is_monomial = True``) or 1 + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y, z = ring("x,y,z", ZZ) + >>> f = 3*x**2*y - x*y*z + 7*z**3 + 23 + + >>> f.coeff(x**2*y) + 3 + >>> f.coeff(x*y) + 0 + >>> f.coeff(1) + 23 + + """ + if element == 1: + return self._get_coeff(self.ring.zero_monom) + elif self.ring.is_element(element): + terms = list(element.iterterms()) + if len(terms) == 1: + monom, coeff = terms[0] + if coeff == self.ring.domain.one: + return self._get_coeff(monom) + + raise ValueError("expected a monomial, got %s" % element) + + def const(self): + """Returns the constant coefficient. """ + return self._get_coeff(self.ring.zero_monom) + + @property + def LC(self): + return self._get_coeff(self.leading_expv()) + + @property + def LM(self): + expv = self.leading_expv() + if expv is None: + return self.ring.zero_monom + else: + return expv + + def leading_monom(self): + """ + Leading monomial as a polynomial element. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> (3*x*y + y**2).leading_monom() + x*y + + """ + p = self.ring.zero + expv = self.leading_expv() + if expv: + p[expv] = self.ring.domain.one + return p + + @property + def LT(self): + expv = self.leading_expv() + if expv is None: + return (self.ring.zero_monom, self.ring.domain.zero) + else: + return (expv, self._get_coeff(expv)) + + def leading_term(self): + """Leading term as a polynomial element. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> (3*x*y + y**2).leading_term() + 3*x*y + + """ + p = self.ring.zero + expv = self.leading_expv() + if expv is not None: + p[expv] = self[expv] + return p + + def _sorted(self, seq, order): + if order is None: + order = self.ring.order + else: + order = OrderOpt.preprocess(order) + + if order is lex: + return sorted(seq, key=lambda monom: monom[0], reverse=True) + else: + return sorted(seq, key=lambda monom: order(monom[0]), reverse=True) + + def coeffs(self, order=None): + """Ordered list of polynomial coefficients. + + Parameters + ========== + + order : :class:`~.MonomialOrder` or coercible, optional + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex, grlex + + >>> _, x, y = ring("x, y", ZZ, lex) + >>> f = x*y**7 + 2*x**2*y**3 + + >>> f.coeffs() + [2, 1] + >>> f.coeffs(grlex) + [1, 2] + + """ + return [ coeff for _, coeff in self.terms(order) ] + + def monoms(self, order=None): + """Ordered list of polynomial monomials. + + Parameters + ========== + + order : :class:`~.MonomialOrder` or coercible, optional + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex, grlex + + >>> _, x, y = ring("x, y", ZZ, lex) + >>> f = x*y**7 + 2*x**2*y**3 + + >>> f.monoms() + [(2, 3), (1, 7)] + >>> f.monoms(grlex) + [(1, 7), (2, 3)] + + """ + return [ monom for monom, _ in self.terms(order) ] + + def terms(self, order=None): + """Ordered list of polynomial terms. + + Parameters + ========== + + order : :class:`~.MonomialOrder` or coercible, optional + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> from sympy.polys.orderings import lex, grlex + + >>> _, x, y = ring("x, y", ZZ, lex) + >>> f = x*y**7 + 2*x**2*y**3 + + >>> f.terms() + [((2, 3), 2), ((1, 7), 1)] + >>> f.terms(grlex) + [((1, 7), 1), ((2, 3), 2)] + + """ + return self._sorted(list(self.items()), order) + + def itercoeffs(self): + """Iterator over coefficients of a polynomial. """ + return iter(self.values()) + + def itermonoms(self): + """Iterator over monomials of a polynomial. """ + return iter(self.keys()) + + def iterterms(self): + """Iterator over terms of a polynomial. """ + return iter(self.items()) + + def listcoeffs(self): + """Unordered list of polynomial coefficients. """ + return list(self.values()) + + def listmonoms(self): + """Unordered list of polynomial monomials. """ + return list(self.keys()) + + def listterms(self): + """Unordered list of polynomial terms. """ + return list(self.items()) + + def imul_num(p, c): + """multiply inplace the polynomial p by an element in the + coefficient ring, provided p is not one of the generators; + else multiply not inplace + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring('x, y', ZZ) + >>> p = x + y**2 + >>> p1 = p.imul_num(3) + >>> p1 + 3*x + 3*y**2 + >>> p1 is p + True + >>> p = x + >>> p1 = p.imul_num(3) + >>> p1 + 3*x + >>> p1 is p + False + + """ + if p in p.ring._gens_set: + return p*c + if not c: + p.clear() + return + for exp in p: + p[exp] *= c + return p + + def content(f): + """Returns GCD of polynomial's coefficients. """ + domain = f.ring.domain + cont = domain.zero + gcd = domain.gcd + + for coeff in f.itercoeffs(): + cont = gcd(cont, coeff) + + return cont + + def primitive(f): + """Returns content and a primitive polynomial. """ + cont = f.content() + if cont == f.ring.domain.zero: + return (cont, f) + return cont, f.quo_ground(cont) + + def monic(f): + """Divides all coefficients by the leading coefficient. """ + if not f: + return f + else: + return f.quo_ground(f.LC) + + def mul_ground(f, x): + if not x: + return f.ring.zero + + terms = [ (monom, coeff*x) for monom, coeff in f.iterterms() ] + return f.new(terms) + + def mul_monom(f, monom): + monomial_mul = f.ring.monomial_mul + terms = [ (monomial_mul(f_monom, monom), f_coeff) for f_monom, f_coeff in f.items() ] + return f.new(terms) + + def mul_term(f, term): + monom, coeff = term + + if not f or not coeff: + return f.ring.zero + elif monom == f.ring.zero_monom: + return f.mul_ground(coeff) + + monomial_mul = f.ring.monomial_mul + terms = [ (monomial_mul(f_monom, monom), f_coeff*coeff) for f_monom, f_coeff in f.items() ] + return f.new(terms) + + def quo_ground(f, x): + domain = f.ring.domain + + if not x: + raise ZeroDivisionError('polynomial division') + if not f or x == domain.one: + return f + + if domain.is_Field: + quo = domain.quo + terms = [ (monom, quo(coeff, x)) for monom, coeff in f.iterterms() ] + else: + terms = [ (monom, coeff // x) for monom, coeff in f.iterterms() if not (coeff % x) ] + + return f.new(terms) + + def quo_term(f, term): + monom, coeff = term + + if not coeff: + raise ZeroDivisionError("polynomial division") + elif not f: + return f.ring.zero + elif monom == f.ring.zero_monom: + return f.quo_ground(coeff) + + term_div = f._term_div() + + terms = [ term_div(t, term) for t in f.iterterms() ] + return f.new([ t for t in terms if t is not None ]) + + def trunc_ground(f, p): + if f.ring.domain.is_ZZ: + terms = [] + + for monom, coeff in f.iterterms(): + coeff = coeff % p + + if coeff > p // 2: + coeff = coeff - p + + terms.append((monom, coeff)) + else: + terms = [ (monom, coeff % p) for monom, coeff in f.iterterms() ] + + poly = f.new(terms) + poly.strip_zero() + return poly + + rem_ground = trunc_ground + + def extract_ground(self, g): + f = self + fc = f.content() + gc = g.content() + + gcd = f.ring.domain.gcd(fc, gc) + + f = f.quo_ground(gcd) + g = g.quo_ground(gcd) + + return gcd, f, g + + def _norm(f, norm_func): + if not f: + return f.ring.domain.zero + else: + ground_abs = f.ring.domain.abs + return norm_func([ ground_abs(coeff) for coeff in f.itercoeffs() ]) + + def max_norm(f): + return f._norm(max) + + def l1_norm(f): + return f._norm(sum) + + def deflate(f, *G): + ring = f.ring + polys = [f] + list(G) + + J = [0]*ring.ngens + + for p in polys: + for monom in p.itermonoms(): + for i, m in enumerate(monom): + J[i] = igcd(J[i], m) + + for i, b in enumerate(J): + if not b: + J[i] = 1 + + J = tuple(J) + + if all(b == 1 for b in J): + return J, polys + + H = [] + + for p in polys: + h = ring.zero + + for I, coeff in p.iterterms(): + N = [ i // j for i, j in zip(I, J) ] + h[tuple(N)] = coeff + + H.append(h) + + return J, H + + def inflate(f, J): + poly = f.ring.zero + + for I, coeff in f.iterterms(): + N = [ i*j for i, j in zip(I, J) ] + poly[tuple(N)] = coeff + + return poly + + def lcm(self, g): + f = self + domain = f.ring.domain + + if not domain.is_Field: + fc, f = f.primitive() + gc, g = g.primitive() + c = domain.lcm(fc, gc) + + h = (f*g).quo(f.gcd(g)) + + if not domain.is_Field: + return h.mul_ground(c) + else: + return h.monic() + + def gcd(f, g): + return f.cofactors(g)[0] + + def cofactors(f, g): + if not f and not g: + zero = f.ring.zero + return zero, zero, zero + elif not f: + h, cff, cfg = f._gcd_zero(g) + return h, cff, cfg + elif not g: + h, cfg, cff = g._gcd_zero(f) + return h, cff, cfg + elif len(f) == 1: + h, cff, cfg = f._gcd_monom(g) + return h, cff, cfg + elif len(g) == 1: + h, cfg, cff = g._gcd_monom(f) + return h, cff, cfg + + J, (f, g) = f.deflate(g) + h, cff, cfg = f._gcd(g) + + return (h.inflate(J), cff.inflate(J), cfg.inflate(J)) + + def _gcd_zero(f, g): + one, zero = f.ring.one, f.ring.zero + if g.is_nonnegative: + return g, zero, one + else: + return -g, zero, -one + + def _gcd_monom(f, g): + ring = f.ring + ground_gcd = ring.domain.gcd + ground_quo = ring.domain.quo + monomial_gcd = ring.monomial_gcd + monomial_ldiv = ring.monomial_ldiv + mf, cf = list(f.iterterms())[0] + _mgcd, _cgcd = mf, cf + for mg, cg in g.iterterms(): + _mgcd = monomial_gcd(_mgcd, mg) + _cgcd = ground_gcd(_cgcd, cg) + h = f.new([(_mgcd, _cgcd)]) + cff = f.new([(monomial_ldiv(mf, _mgcd), ground_quo(cf, _cgcd))]) + cfg = f.new([(monomial_ldiv(mg, _mgcd), ground_quo(cg, _cgcd)) for mg, cg in g.iterterms()]) + return h, cff, cfg + + def _gcd(f, g): + ring = f.ring + + if ring.domain.is_QQ: + return f._gcd_QQ(g) + elif ring.domain.is_ZZ: + return f._gcd_ZZ(g) + else: # TODO: don't use dense representation (port PRS algorithms) + return ring.dmp_inner_gcd(f, g) + + def _gcd_ZZ(f, g): + return heugcd(f, g) + + def _gcd_QQ(self, g): + f = self + ring = f.ring + new_ring = ring.clone(domain=ring.domain.get_ring()) + + cf, f = f.clear_denoms() + cg, g = g.clear_denoms() + + f = f.set_ring(new_ring) + g = g.set_ring(new_ring) + + h, cff, cfg = f._gcd_ZZ(g) + + h = h.set_ring(ring) + c, h = h.LC, h.monic() + + cff = cff.set_ring(ring).mul_ground(ring.domain.quo(c, cf)) + cfg = cfg.set_ring(ring).mul_ground(ring.domain.quo(c, cg)) + + return h, cff, cfg + + def cancel(self, g): + """ + Cancel common factors in a rational function ``f/g``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> (2*x**2 - 2).cancel(x**2 - 2*x + 1) + (2*x + 2, x - 1) + + """ + f = self + ring = f.ring + + if not f: + return f, ring.one + + domain = ring.domain + + if not (domain.is_Field and domain.has_assoc_Ring): + _, p, q = f.cofactors(g) + else: + new_ring = ring.clone(domain=domain.get_ring()) + + cq, f = f.clear_denoms() + cp, g = g.clear_denoms() + + f = f.set_ring(new_ring) + g = g.set_ring(new_ring) + + _, p, q = f.cofactors(g) + _, cp, cq = new_ring.domain.cofactors(cp, cq) + + p = p.set_ring(ring) + q = q.set_ring(ring) + + p = p.mul_ground(cp) + q = q.mul_ground(cq) + + # Make canonical with respect to sign or quadrant in the case of ZZ_I + # or QQ_I. This ensures that the LC of the denominator is canonical by + # multiplying top and bottom by a unit of the ring. + u = q.canonical_unit() + if u == domain.one: + pass + elif u == -domain.one: + p, q = -p, -q + else: + p = p.mul_ground(u) + q = q.mul_ground(u) + + return p, q + + def canonical_unit(f): + domain = f.ring.domain + return domain.canonical_unit(f.LC) + + def diff(f, x): + """Computes partial derivative in ``x``. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + + >>> _, x, y = ring("x,y", ZZ) + >>> p = x + x**2*y**3 + >>> p.diff(x) + 2*x*y**3 + 1 + + """ + ring = f.ring + i = ring.index(x) + m = ring.monomial_basis(i) + g = ring.zero + for expv, coeff in f.iterterms(): + if expv[i]: + e = ring.monomial_ldiv(expv, m) + g[e] = ring.domain_new(coeff*expv[i]) + return g + + def __call__(f, *values): + if 0 < len(values) <= f.ring.ngens: + return f.evaluate(list(zip(f.ring.gens, values))) + else: + raise ValueError("expected at least 1 and at most %s values, got %s" % (f.ring.ngens, len(values))) + + def evaluate(self, x, a=None): + f = self + + if isinstance(x, list) and a is None: + (X, a), x = x[0], x[1:] + f = f.evaluate(X, a) + + if not x: + return f + else: + x = [ (Y.drop(X), a) for (Y, a) in x ] + return f.evaluate(x) + + ring = f.ring + i = ring.index(x) + a = ring.domain.convert(a) + + if ring.ngens == 1: + result = ring.domain.zero + + for (n,), coeff in f.iterterms(): + result += coeff*a**n + + return result + else: + poly = ring.drop(x).zero + + for monom, coeff in f.iterterms(): + n, monom = monom[i], monom[:i] + monom[i+1:] + coeff = coeff*a**n + + if monom in poly: + coeff = coeff + poly[monom] + + if coeff: + poly[monom] = coeff + else: + del poly[monom] + else: + if coeff: + poly[monom] = coeff + + return poly + + def subs(self, x, a=None): + f = self + + if isinstance(x, list) and a is None: + for X, a in x: + f = f.subs(X, a) + return f + + ring = f.ring + i = ring.index(x) + a = ring.domain.convert(a) + + if ring.ngens == 1: + result = ring.domain.zero + + for (n,), coeff in f.iterterms(): + result += coeff*a**n + + return ring.ground_new(result) + else: + poly = ring.zero + + for monom, coeff in f.iterterms(): + n, monom = monom[i], monom[:i] + (0,) + monom[i+1:] + coeff = coeff*a**n + + if monom in poly: + coeff = coeff + poly[monom] + + if coeff: + poly[monom] = coeff + else: + del poly[monom] + else: + if coeff: + poly[monom] = coeff + + return poly + + def symmetrize(self): + r""" + Rewrite *self* in terms of elementary symmetric polynomials. + + Explanation + =========== + + If this :py:class:`~.PolyElement` belongs to a ring of $n$ variables, + we can try to write it as a function of the elementary symmetric + polynomials on $n$ variables. We compute a symmetric part, and a + remainder for any part we were not able to symmetrize. + + Examples + ======== + + >>> from sympy.polys.rings import ring + >>> from sympy.polys.domains import ZZ + >>> R, x, y = ring("x,y", ZZ) + + >>> f = x**2 + y**2 + >>> f.symmetrize() + (x**2 - 2*y, 0, [(x, x + y), (y, x*y)]) + + >>> f = x**2 - y**2 + >>> f.symmetrize() + (x**2 - 2*y, -2*y**2, [(x, x + y), (y, x*y)]) + + Returns + ======= + + Triple ``(p, r, m)`` + ``p`` is a :py:class:`~.PolyElement` that represents our attempt + to express *self* as a function of elementary symmetric + polynomials. Each variable in ``p`` stands for one of the + elementary symmetric polynomials. The correspondence is given + by ``m``. + + ``r`` is the remainder. + + ``m`` is a list of pairs, giving the mapping from variables in + ``p`` to elementary symmetric polynomials. + + The triple satisfies the equation ``p.compose(m) + r == self``. + If the remainder ``r`` is zero, *self* is symmetric. If it is + nonzero, we were not able to represent *self* as symmetric. + + See Also + ======== + + sympy.polys.polyfuncs.symmetrize + + References + ========== + + .. [1] Lauer, E. Algorithms for symmetrical polynomials, Proc. 1976 + ACM Symp. on Symbolic and Algebraic Computing, NY 242-247. + https://dl.acm.org/doi/pdf/10.1145/800205.806342 + + """ + f = self.copy() + ring = f.ring + n = ring.ngens + + if not n: + return f, ring.zero, [] + + polys = [ring.symmetric_poly(i+1) for i in range(n)] + + poly_powers = {} + def get_poly_power(i, n): + if (i, n) not in poly_powers: + poly_powers[(i, n)] = polys[i]**n + return poly_powers[(i, n)] + + indices = list(range(n - 1)) + weights = list(range(n, 0, -1)) + + symmetric = ring.zero + + while f: + _height, _monom, _coeff = -1, None, None + + for i, (monom, coeff) in enumerate(f.terms()): + if all(monom[i] >= monom[i + 1] for i in indices): + height = max(n*m for n, m in zip(weights, monom)) + + if height > _height: + _height, _monom, _coeff = height, monom, coeff + + if _height != -1: + monom, coeff = _monom, _coeff + else: + break + + exponents = [] + for m1, m2 in zip(monom, monom[1:] + (0,)): + exponents.append(m1 - m2) + + symmetric += ring.term_new(tuple(exponents), coeff) + + product = coeff + for i, n in enumerate(exponents): + product *= get_poly_power(i, n) + f -= product + + mapping = list(zip(ring.gens, polys)) + + return symmetric, f, mapping + + def compose(f, x, a=None): + ring = f.ring + poly = ring.zero + gens_map = dict(zip(ring.gens, range(ring.ngens))) + + if a is not None: + replacements = [(x, a)] + else: + if isinstance(x, list): + replacements = list(x) + elif isinstance(x, dict): + replacements = sorted(x.items(), key=lambda k: gens_map[k[0]]) + else: + raise ValueError("expected a generator, value pair a sequence of such pairs") + + for k, (x, g) in enumerate(replacements): + replacements[k] = (gens_map[x], ring.ring_new(g)) + + for monom, coeff in f.iterterms(): + monom = list(monom) + subpoly = ring.one + + for i, g in replacements: + n, monom[i] = monom[i], 0 + if n: + subpoly *= g**n + + subpoly = subpoly.mul_term((tuple(monom), coeff)) + poly += subpoly + + return poly + + def coeff_wrt(self, x, deg): + """ + Coefficient of ``self`` with respect to ``x**deg``. + + Treating ``self`` as a univariate polynomial in ``x`` this finds the + coefficient of ``x**deg`` as a polynomial in the other generators. + + Parameters + ========== + + x : generator or generator index + The generator or generator index to compute the expression for. + deg : int + The degree of the monomial to compute the expression for. + + Returns + ======= + + :py:class:`~.PolyElement` + The coefficient of ``x**deg`` as a polynomial in the same ring. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x, y, z = ring("x, y, z", ZZ) + + >>> p = 2*x**4 + 3*y**4 + 10*z**2 + 10*x*z**2 + >>> deg = 2 + >>> p.coeff_wrt(2, deg) # Using the generator index + 10*x + 10 + >>> p.coeff_wrt(z, deg) # Using the generator + 10*x + 10 + >>> p.coeff(z**2) # shows the difference between coeff and coeff_wrt + 10 + + See Also + ======== + + coeff, coeffs + + """ + p = self + i = p.ring.index(x) + terms = [(m, c) for m, c in p.iterterms() if m[i] == deg] + + if not terms: + return p.ring.zero + + monoms, coeffs = zip(*terms) + monoms = [m[:i] + (0,) + m[i + 1:] for m in monoms] + return p.ring.from_dict(dict(zip(monoms, coeffs))) + + def prem(self, g, x=None): + """ + Pseudo-remainder of the polynomial ``self`` with respect to ``g``. + + The pseudo-quotient ``q`` and pseudo-remainder ``r`` with respect to + ``z`` when dividing ``f`` by ``g`` satisfy ``m*f = g*q + r``, + where ``deg(r,z) < deg(g,z)`` and + ``m = LC(g,z)**(deg(f,z) - deg(g,z)+1)``. + + See :meth:`pdiv` for explanation of pseudo-division. + + + Parameters + ========== + + g : :py:class:`~.PolyElement` + The polynomial to divide ``self`` by. + x : generator or generator index, optional + The main variable of the polynomials and default is first generator. + + Returns + ======= + + :py:class:`~.PolyElement` + The pseudo-remainder polynomial. + + Raises + ====== + + ZeroDivisionError : If ``g`` is the zero polynomial. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2 + >>> f.prem(g) # first generator is chosen by default if it is not given + -4*y + 4 + >>> f.rem(g) # shows the difference between prem and rem + x**2 + x*y + >>> f.prem(g, y) # generator is given + 0 + >>> f.prem(g, 1) # generator index is given + 0 + + See Also + ======== + + pdiv, pquo, pexquo, sympy.polys.domains.ring.Ring.rem + + """ + f = self + x = f.ring.index(x) + df = f.degree(x) + dg = g.degree(x) + + if dg < 0: + raise ZeroDivisionError('polynomial division') + + r, dr = f, df + + if df < dg: + return r + + N = df - dg + 1 + + lc_g = g.coeff_wrt(x, dg) + + xp = f.ring.gens[x] + + while True: + + lc_r = r.coeff_wrt(x, dr) + j, N = dr - dg, N - 1 + + R = r * lc_g + G = g * lc_r * xp**j + r = R - G + + dr = r.degree(x) + + if dr < dg: + break + + c = lc_g ** N + + return r * c + + def pdiv(self, g, x=None): + """ + Computes the pseudo-division of the polynomial ``self`` with respect to ``g``. + + The pseudo-division algorithm is used to find the pseudo-quotient ``q`` + and pseudo-remainder ``r`` such that ``m*f = g*q + r``, where ``m`` + represents the multiplier and ``f`` is the dividend polynomial. + + The pseudo-quotient ``q`` and pseudo-remainder ``r`` are polynomials in + the variable ``x``, with the degree of ``r`` with respect to ``x`` + being strictly less than the degree of ``g`` with respect to ``x``. + + The multiplier ``m`` is defined as + ``LC(g, x) ^ (deg(f, x) - deg(g, x) + 1)``, + where ``LC(g, x)`` represents the leading coefficient of ``g``. + + It is important to note that in the context of the ``prem`` method, + multivariate polynomials in a ring, such as ``R[x,y,z]``, are treated + as univariate polynomials with coefficients that are polynomials, + such as ``R[x,y][z]``. When dividing ``f`` by ``g`` with respect to the + variable ``z``, the pseudo-quotient ``q`` and pseudo-remainder ``r`` + satisfy ``m*f = g*q + r``, where ``deg(r, z) < deg(g, z)`` + and ``m = LC(g, z)^(deg(f, z) - deg(g, z) + 1)``. + + In this function, the pseudo-remainder ``r`` can be obtained using the + ``prem`` method, the pseudo-quotient ``q`` can + be obtained using the ``pquo`` method, and + the function ``pdiv`` itself returns a tuple ``(q, r)``. + + + Parameters + ========== + + g : :py:class:`~.PolyElement` + The polynomial to divide ``self`` by. + x : generator or generator index, optional + The main variable of the polynomials and default is first generator. + + Returns + ======= + + :py:class:`~.PolyElement` + The pseudo-division polynomial (tuple of ``q`` and ``r``). + + Raises + ====== + + ZeroDivisionError : If ``g`` is the zero polynomial. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2 + >>> f.pdiv(g) # first generator is chosen by default if it is not given + (2*x + 2*y - 2, -4*y + 4) + >>> f.div(g) # shows the difference between pdiv and div + (0, x**2 + x*y) + >>> f.pdiv(g, y) # generator is given + (2*x**3 + 2*x**2*y + 6*x**2 + 2*x*y + 8*x + 4, 0) + >>> f.pdiv(g, 1) # generator index is given + (2*x**3 + 2*x**2*y + 6*x**2 + 2*x*y + 8*x + 4, 0) + + See Also + ======== + + prem + Computes only the pseudo-remainder more efficiently than + `f.pdiv(g)[1]`. + pquo + Returns only the pseudo-quotient. + pexquo + Returns only an exact pseudo-quotient having no remainder. + div + Returns quotient and remainder of f and g polynomials. + + """ + f = self + x = f.ring.index(x) + + df = f.degree(x) + dg = g.degree(x) + + if dg < 0: + raise ZeroDivisionError("polynomial division") + + q, r, dr = x, f, df + + if df < dg: + return q, r + + N = df - dg + 1 + lc_g = g.coeff_wrt(x, dg) + + xp = f.ring.gens[x] + + while True: + + lc_r = r.coeff_wrt(x, dr) + j, N = dr - dg, N - 1 + + Q = q * lc_g + + q = Q + (lc_r)*xp**j + + R = r * lc_g + + G = g * lc_r * xp**j + + r = R - G + + dr = r.degree(x) + + if dr < dg: + break + + c = lc_g**N + + q = q * c + r = r * c + + return q, r + + def pquo(self, g, x=None): + """ + Polynomial pseudo-quotient in multivariate polynomial ring. + + Examples + ======== + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2*y + >>> h = 2*x + 2 + >>> f.pquo(g) + 2*x + >>> f.quo(g) # shows the difference between pquo and quo + 0 + >>> f.pquo(h) + 2*x + 2*y - 2 + >>> f.quo(h) # shows the difference between pquo and quo + 0 + + See Also + ======== + + prem, pdiv, pexquo, sympy.polys.domains.ring.Ring.quo + + """ + f = self + return f.pdiv(g, x)[0] + + def pexquo(self, g, x=None): + """ + Polynomial exact pseudo-quotient in multivariate polynomial ring. + + Examples + ======== + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**2 + x*y + >>> g = 2*x + 2*y + >>> h = 2*x + 2 + >>> f.pexquo(g) + 2*x + >>> f.exquo(g) # shows the difference between pexquo and exquo + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x + 2*y does not divide x**2 + x*y + >>> f.pexquo(h) + Traceback (most recent call last): + ... + ExactQuotientFailed: 2*x + 2 does not divide x**2 + x*y + + See Also + ======== + + prem, pdiv, pquo, sympy.polys.domains.ring.Ring.exquo + + """ + f = self + q, r = f.pdiv(g, x) + + if r.is_zero: + return q + else: + raise ExactQuotientFailed(f, g) + + def subresultants(self, g, x=None): + """ + Computes the subresultant PRS of two polynomials ``self`` and ``g``. + + Parameters + ========== + + g : :py:class:`~.PolyElement` + The second polynomial. + x : generator or generator index + The variable with respect to which the subresultant sequence is computed. + + Returns + ======= + + R : list + Returns a list polynomials representing the subresultant PRS. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x, y = ring("x, y", ZZ) + + >>> f = x**2*y + x*y + >>> g = x + y + >>> f.subresultants(g) # first generator is chosen by default if not given + [x**2*y + x*y, x + y, y**3 - y**2] + >>> f.subresultants(g, 0) # generator index is given + [x**2*y + x*y, x + y, y**3 - y**2] + >>> f.subresultants(g, y) # generator is given + [x**2*y + x*y, x + y, x**3 + x**2] + + """ + f = self + x = f.ring.index(x) + n = f.degree(x) + m = g.degree(x) + + if n < m: + f, g = g, f + n, m = m, n + + if f == 0: + return [0, 0] + + if g == 0: + return [f, 1] + + R = [f, g] + + d = n - m + b = (-1) ** (d + 1) + + # Compute the pseudo-remainder for f and g + h = f.prem(g, x) + h = h * b + + # Compute the coefficient of g with respect to x**m + lc = g.coeff_wrt(x, m) + + c = lc ** d + + S = [1, c] + + c = -c + + while h: + k = h.degree(x) + + R.append(h) + f, g, m, d = g, h, k, m - k + + b = -lc * c ** d + h = f.prem(g, x) + h = h.exquo(b) + + lc = g.coeff_wrt(x, k) + + if d > 1: + p = (-lc) ** d + q = c ** (d - 1) + c = p.exquo(q) + else: + c = -lc + + S.append(-c) + + return R + + # TODO: following methods should point to polynomial + # representation independent algorithm implementations. + + def half_gcdex(f, g): + return f.ring.dmp_half_gcdex(f, g) + + def gcdex(f, g): + return f.ring.dmp_gcdex(f, g) + + def resultant(f, g): + return f.ring.dmp_resultant(f, g) + + def discriminant(f): + return f.ring.dmp_discriminant(f) + + def decompose(f): + if f.ring.is_univariate: + return f.ring.dup_decompose(f) + else: + raise MultivariatePolynomialError("polynomial decomposition") + + def shift(f, a): + if f.ring.is_univariate: + return f.ring.dup_shift(f, a) + else: + raise MultivariatePolynomialError("shift: use shift_list instead") + + def shift_list(f, a): + return f.ring.dmp_shift(f, a) + + def sturm(f): + if f.ring.is_univariate: + return f.ring.dup_sturm(f) + else: + raise MultivariatePolynomialError("sturm sequence") + + def gff_list(f): + return f.ring.dmp_gff_list(f) + + def norm(f): + return f.ring.dmp_norm(f) + + def sqf_norm(f): + return f.ring.dmp_sqf_norm(f) + + def sqf_part(f): + return f.ring.dmp_sqf_part(f) + + def sqf_list(f, all=False): + return f.ring.dmp_sqf_list(f, all=all) + + def factor_list(f): + return f.ring.dmp_factor_list(f) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootisolation.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootisolation.py new file mode 100644 index 0000000000000000000000000000000000000000..b2f8fd115e49ce8dcf4db8659a60c3361818b7bb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootisolation.py @@ -0,0 +1,2190 @@ +"""Real and complex root isolation and refinement algorithms. """ + + +from sympy.polys.densearith import ( + dup_neg, dup_rshift, dup_rem, + dup_l2_norm_squared) +from sympy.polys.densebasic import ( + dup_LC, dup_TC, dup_degree, + dup_strip, dup_reverse, + dup_convert, + dup_terms_gcd) +from sympy.polys.densetools import ( + dup_clear_denoms, + dup_mirror, dup_scale, dup_shift, + dup_transform, + dup_diff, + dup_eval, dmp_eval_in, + dup_sign_variations, + dup_real_imag) +from sympy.polys.euclidtools import ( + dup_discriminant) +from sympy.polys.factortools import ( + dup_factor_list) +from sympy.polys.polyerrors import ( + RefinementFailed, + DomainError, + PolynomialError) +from sympy.polys.sqfreetools import ( + dup_sqf_part, dup_sqf_list) + + +def dup_sturm(f, K): + """ + Computes the Sturm sequence of ``f`` in ``F[x]``. + + Given a univariate, square-free polynomial ``f(x)`` returns the + associated Sturm sequence ``f_0(x), ..., f_n(x)`` defined by:: + + f_0(x), f_1(x) = f(x), f'(x) + f_n = -rem(f_{n-2}(x), f_{n-1}(x)) + + Examples + ======== + + >>> from sympy.polys import ring, QQ + >>> R, x = ring("x", QQ) + + >>> R.dup_sturm(x**3 - 2*x**2 + x - 3) + [x**3 - 2*x**2 + x - 3, 3*x**2 - 4*x + 1, 2/9*x + 25/9, -2079/4] + + References + ========== + + .. [1] [Davenport88]_ + + """ + if not K.is_Field: + raise DomainError("Cannot compute Sturm sequence over %s" % K) + + f = dup_sqf_part(f, K) + + sturm = [f, dup_diff(f, 1, K)] + + while sturm[-1]: + s = dup_rem(sturm[-2], sturm[-1], K) + sturm.append(dup_neg(s, K)) + + return sturm[:-1] + +def dup_root_upper_bound(f, K): + """Compute the LMQ upper bound for the positive roots of `f`; + LMQ (Local Max Quadratic) was developed by Akritas-Strzebonski-Vigklas. + + References + ========== + .. [1] Alkiviadis G. Akritas: "Linear and Quadratic Complexity Bounds on the + Values of the Positive Roots of Polynomials" + Journal of Universal Computer Science, Vol. 15, No. 3, 523-537, 2009. + """ + n, P = len(f), [] + t = n * [K.one] + if dup_LC(f, K) < 0: + f = dup_neg(f, K) + f = list(reversed(f)) + + for i in range(0, n): + if f[i] >= 0: + continue + + a, QL = K.log(-f[i], 2), [] + + for j in range(i + 1, n): + + if f[j] <= 0: + continue + + q = t[j] + a - K.log(f[j], 2) + QL.append([q // (j - i), j]) + + if not QL: + continue + + q = min(QL) + + t[q[1]] = t[q[1]] + 1 + + P.append(q[0]) + + if not P: + return None + else: + return K.get_field()(2)**(max(P) + 1) + +def dup_root_lower_bound(f, K): + """Compute the LMQ lower bound for the positive roots of `f`; + LMQ (Local Max Quadratic) was developed by Akritas-Strzebonski-Vigklas. + + References + ========== + .. [1] Alkiviadis G. Akritas: "Linear and Quadratic Complexity Bounds on the + Values of the Positive Roots of Polynomials" + Journal of Universal Computer Science, Vol. 15, No. 3, 523-537, 2009. + """ + bound = dup_root_upper_bound(dup_reverse(f), K) + + if bound is not None: + return 1/bound + else: + return None + +def dup_cauchy_upper_bound(f, K): + """ + Compute the Cauchy upper bound on the absolute value of all roots of f, + real or complex. + + References + ========== + .. [1] https://en.wikipedia.org/wiki/Geometrical_properties_of_polynomial_roots#Lagrange's_and_Cauchy's_bounds + """ + n = dup_degree(f) + if n < 1: + raise PolynomialError('Polynomial has no roots.') + + if K.is_ZZ: + L = K.get_field() + f, K = dup_convert(f, K, L), L + elif not K.is_QQ or K.is_RR or K.is_CC: + # We need to compute absolute value, and we are not supporting cases + # where this would take us outside the domain (or its quotient field). + raise DomainError('Cauchy bound not supported over %s' % K) + else: + f = f[:] + + while K.is_zero(f[-1]): + f.pop() + if len(f) == 1: + # Monomial. All roots are zero. + return K.zero + + lc = f[0] + return K.one + max(abs(n / lc) for n in f[1:]) + +def dup_cauchy_lower_bound(f, K): + """Compute the Cauchy lower bound on the absolute value of all non-zero + roots of f, real or complex.""" + g = dup_reverse(f) + if len(g) < 2: + raise PolynomialError('Polynomial has no non-zero roots.') + if K.is_ZZ: + K = K.get_field() + b = dup_cauchy_upper_bound(g, K) + return K.one / b + +def dup_mignotte_sep_bound_squared(f, K): + """ + Return the square of the Mignotte lower bound on separation between + distinct roots of f. The square is returned so that the bound lies in + K or its quotient field. + + References + ========== + + .. [1] Mignotte, Maurice. "Some useful bounds." Computer algebra. + Springer, Vienna, 1982. 259-263. + https://people.dm.unipi.it/gianni/AC-EAG/Mignotte.pdf + """ + n = dup_degree(f) + if n < 2: + raise PolynomialError('Polynomials of degree < 2 have no distinct roots.') + + if K.is_ZZ: + L = K.get_field() + f, K = dup_convert(f, K, L), L + elif not K.is_QQ or K.is_RR or K.is_CC: + # We need to compute absolute value, and we are not supporting cases + # where this would take us outside the domain (or its quotient field). + raise DomainError('Mignotte bound not supported over %s' % K) + + D = dup_discriminant(f, K) + l2sq = dup_l2_norm_squared(f, K) + return K(3)*K.abs(D) / ( K(n)**(n+1) * l2sq**(n-1) ) + +def _mobius_from_interval(I, field): + """Convert an open interval to a Mobius transform. """ + s, t = I + + a, c = field.numer(s), field.denom(s) + b, d = field.numer(t), field.denom(t) + + return a, b, c, d + +def _mobius_to_interval(M, field): + """Convert a Mobius transform to an open interval. """ + a, b, c, d = M + + s, t = field(a, c), field(b, d) + + if s <= t: + return (s, t) + else: + return (t, s) + +def dup_step_refine_real_root(f, M, K, fast=False): + """One step of positive real root refinement algorithm. """ + a, b, c, d = M + + if a == b and c == d: + return f, (a, b, c, d) + + A = dup_root_lower_bound(f, K) + + if A is not None: + A = K(int(A)) + else: + A = K.zero + + if fast and A > 16: + f = dup_scale(f, A, K) + a, c, A = A*a, A*c, K.one + + if A >= K.one: + f = dup_shift(f, A, K) + b, d = A*a + b, A*c + d + + if not dup_eval(f, K.zero, K): + return f, (b, b, d, d) + + f, g = dup_shift(f, K.one, K), f + + a1, b1, c1, d1 = a, a + b, c, c + d + + if not dup_eval(f, K.zero, K): + return f, (b1, b1, d1, d1) + + k = dup_sign_variations(f, K) + + if k == 1: + a, b, c, d = a1, b1, c1, d1 + else: + f = dup_shift(dup_reverse(g), K.one, K) + + if not dup_eval(f, K.zero, K): + f = dup_rshift(f, 1, K) + + a, b, c, d = b, a + b, d, c + d + + return f, (a, b, c, d) + +def dup_inner_refine_real_root(f, M, K, eps=None, steps=None, disjoint=None, fast=False, mobius=False): + """Refine a positive root of `f` given a Mobius transform or an interval. """ + F = K.get_field() + + if len(M) == 2: + a, b, c, d = _mobius_from_interval(M, F) + else: + a, b, c, d = M + + while not c: + f, (a, b, c, d) = dup_step_refine_real_root(f, (a, b, c, + d), K, fast=fast) + + if eps is not None and steps is not None: + for i in range(0, steps): + if abs(F(a, c) - F(b, d)) >= eps: + f, (a, b, c, d) = dup_step_refine_real_root(f, (a, b, c, d), K, fast=fast) + else: + break + else: + if eps is not None: + while abs(F(a, c) - F(b, d)) >= eps: + f, (a, b, c, d) = dup_step_refine_real_root(f, (a, b, c, d), K, fast=fast) + + if steps is not None: + for i in range(0, steps): + f, (a, b, c, d) = dup_step_refine_real_root(f, (a, b, c, d), K, fast=fast) + + if disjoint is not None: + while True: + u, v = _mobius_to_interval((a, b, c, d), F) + + if v <= disjoint or disjoint <= u: + break + else: + f, (a, b, c, d) = dup_step_refine_real_root(f, (a, b, c, d), K, fast=fast) + + if not mobius: + return _mobius_to_interval((a, b, c, d), F) + else: + return f, (a, b, c, d) + +def dup_outer_refine_real_root(f, s, t, K, eps=None, steps=None, disjoint=None, fast=False): + """Refine a positive root of `f` given an interval `(s, t)`. """ + a, b, c, d = _mobius_from_interval((s, t), K.get_field()) + + f = dup_transform(f, dup_strip([a, b]), + dup_strip([c, d]), K) + + if dup_sign_variations(f, K) != 1: + raise RefinementFailed("there should be exactly one root in (%s, %s) interval" % (s, t)) + + return dup_inner_refine_real_root(f, (a, b, c, d), K, eps=eps, steps=steps, disjoint=disjoint, fast=fast) + +def dup_refine_real_root(f, s, t, K, eps=None, steps=None, disjoint=None, fast=False): + """Refine real root's approximating interval to the given precision. """ + if K.is_QQ: + (_, f), K = dup_clear_denoms(f, K, convert=True), K.get_ring() + elif not K.is_ZZ: + raise DomainError("real root refinement not supported over %s" % K) + + if s == t: + return (s, t) + + if s > t: + s, t = t, s + + negative = False + + if s < 0: + if t <= 0: + f, s, t, negative = dup_mirror(f, K), -t, -s, True + else: + raise ValueError("Cannot refine a real root in (%s, %s)" % (s, t)) + + if negative and disjoint is not None: + if disjoint < 0: + disjoint = -disjoint + else: + disjoint = None + + s, t = dup_outer_refine_real_root( + f, s, t, K, eps=eps, steps=steps, disjoint=disjoint, fast=fast) + + if negative: + return (-t, -s) + else: + return ( s, t) + +def dup_inner_isolate_real_roots(f, K, eps=None, fast=False): + """Internal function for isolation positive roots up to given precision. + + References + ========== + 1. Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative Study of Two Real Root + Isolation Methods . Nonlinear Analysis: Modelling and Control, Vol. 10, No. 4, 297-304, 2005. + 2. Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. Vigklas: Improving the + Performance of the Continued Fractions Method Using new Bounds of Positive Roots. Nonlinear + Analysis: Modelling and Control, Vol. 13, No. 3, 265-279, 2008. + """ + a, b, c, d = K.one, K.zero, K.zero, K.one + + k = dup_sign_variations(f, K) + + if k == 0: + return [] + if k == 1: + roots = [dup_inner_refine_real_root( + f, (a, b, c, d), K, eps=eps, fast=fast, mobius=True)] + else: + roots, stack = [], [(a, b, c, d, f, k)] + + while stack: + a, b, c, d, f, k = stack.pop() + + A = dup_root_lower_bound(f, K) + + if A is not None: + A = K(int(A)) + else: + A = K.zero + + if fast and A > 16: + f = dup_scale(f, A, K) + a, c, A = A*a, A*c, K.one + + if A >= K.one: + f = dup_shift(f, A, K) + b, d = A*a + b, A*c + d + + if not dup_TC(f, K): + roots.append((f, (b, b, d, d))) + f = dup_rshift(f, 1, K) + + k = dup_sign_variations(f, K) + + if k == 0: + continue + if k == 1: + roots.append(dup_inner_refine_real_root( + f, (a, b, c, d), K, eps=eps, fast=fast, mobius=True)) + continue + + f1 = dup_shift(f, K.one, K) + + a1, b1, c1, d1, r = a, a + b, c, c + d, 0 + + if not dup_TC(f1, K): + roots.append((f1, (b1, b1, d1, d1))) + f1, r = dup_rshift(f1, 1, K), 1 + + k1 = dup_sign_variations(f1, K) + k2 = k - k1 - r + + a2, b2, c2, d2 = b, a + b, d, c + d + + if k2 > 1: + f2 = dup_shift(dup_reverse(f), K.one, K) + + if not dup_TC(f2, K): + f2 = dup_rshift(f2, 1, K) + + k2 = dup_sign_variations(f2, K) + else: + f2 = None + + if k1 < k2: + a1, a2, b1, b2 = a2, a1, b2, b1 + c1, c2, d1, d2 = c2, c1, d2, d1 + f1, f2, k1, k2 = f2, f1, k2, k1 + + if not k1: + continue + + if f1 is None: + f1 = dup_shift(dup_reverse(f), K.one, K) + + if not dup_TC(f1, K): + f1 = dup_rshift(f1, 1, K) + + if k1 == 1: + roots.append(dup_inner_refine_real_root( + f1, (a1, b1, c1, d1), K, eps=eps, fast=fast, mobius=True)) + else: + stack.append((a1, b1, c1, d1, f1, k1)) + + if not k2: + continue + + if f2 is None: + f2 = dup_shift(dup_reverse(f), K.one, K) + + if not dup_TC(f2, K): + f2 = dup_rshift(f2, 1, K) + + if k2 == 1: + roots.append(dup_inner_refine_real_root( + f2, (a2, b2, c2, d2), K, eps=eps, fast=fast, mobius=True)) + else: + stack.append((a2, b2, c2, d2, f2, k2)) + + return roots + +def _discard_if_outside_interval(f, M, inf, sup, K, negative, fast, mobius): + """Discard an isolating interval if outside ``(inf, sup)``. """ + F = K.get_field() + + while True: + u, v = _mobius_to_interval(M, F) + + if negative: + u, v = -v, -u + + if (inf is None or u >= inf) and (sup is None or v <= sup): + if not mobius: + return u, v + else: + return f, M + elif (sup is not None and u > sup) or (inf is not None and v < inf): + return None + else: + f, M = dup_step_refine_real_root(f, M, K, fast=fast) + +def dup_inner_isolate_positive_roots(f, K, eps=None, inf=None, sup=None, fast=False, mobius=False): + """Iteratively compute disjoint positive root isolation intervals. """ + if sup is not None and sup < 0: + return [] + + roots = dup_inner_isolate_real_roots(f, K, eps=eps, fast=fast) + + F, results = K.get_field(), [] + + if inf is not None or sup is not None: + for f, M in roots: + result = _discard_if_outside_interval(f, M, inf, sup, K, False, fast, mobius) + + if result is not None: + results.append(result) + elif not mobius: + results.extend(_mobius_to_interval(M, F) for _, M in roots) + else: + results = roots + + return results + +def dup_inner_isolate_negative_roots(f, K, inf=None, sup=None, eps=None, fast=False, mobius=False): + """Iteratively compute disjoint negative root isolation intervals. """ + if inf is not None and inf >= 0: + return [] + + roots = dup_inner_isolate_real_roots(dup_mirror(f, K), K, eps=eps, fast=fast) + + F, results = K.get_field(), [] + + if inf is not None or sup is not None: + for f, M in roots: + result = _discard_if_outside_interval(f, M, inf, sup, K, True, fast, mobius) + + if result is not None: + results.append(result) + elif not mobius: + for f, M in roots: + u, v = _mobius_to_interval(M, F) + results.append((-v, -u)) + else: + results = roots + + return results + +def _isolate_zero(f, K, inf, sup, basis=False, sqf=False): + """Handle special case of CF algorithm when ``f`` is homogeneous. """ + j, f = dup_terms_gcd(f, K) + + if j > 0: + F = K.get_field() + + if (inf is None or inf <= 0) and (sup is None or 0 <= sup): + if not sqf: + if not basis: + return [((F.zero, F.zero), j)], f + else: + return [((F.zero, F.zero), j, [K.one, K.zero])], f + else: + return [(F.zero, F.zero)], f + + return [], f + +def dup_isolate_real_roots_sqf(f, K, eps=None, inf=None, sup=None, fast=False, blackbox=False): + """Isolate real roots of a square-free polynomial using the Vincent-Akritas-Strzebonski (VAS) CF approach. + + References + ========== + .. [1] Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative + Study of Two Real Root Isolation Methods. Nonlinear Analysis: + Modelling and Control, Vol. 10, No. 4, 297-304, 2005. + .. [2] Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. + Vigklas: Improving the Performance of the Continued Fractions + Method Using New Bounds of Positive Roots. Nonlinear Analysis: + Modelling and Control, Vol. 13, No. 3, 265-279, 2008. + + """ + if K.is_QQ: + (_, f), K = dup_clear_denoms(f, K, convert=True), K.get_ring() + elif not K.is_ZZ: + raise DomainError("isolation of real roots not supported over %s" % K) + + if dup_degree(f) <= 0: + return [] + + I_zero, f = _isolate_zero(f, K, inf, sup, basis=False, sqf=True) + + I_neg = dup_inner_isolate_negative_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast) + I_pos = dup_inner_isolate_positive_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast) + + roots = sorted(I_neg + I_zero + I_pos) + + if not blackbox: + return roots + else: + return [ RealInterval((a, b), f, K) for (a, b) in roots ] + +def dup_isolate_real_roots(f, K, eps=None, inf=None, sup=None, basis=False, fast=False): + """Isolate real roots using Vincent-Akritas-Strzebonski (VAS) continued fractions approach. + + References + ========== + + .. [1] Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative + Study of Two Real Root Isolation Methods. Nonlinear Analysis: + Modelling and Control, Vol. 10, No. 4, 297-304, 2005. + .. [2] Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. + Vigklas: Improving the Performance of the Continued Fractions + Method Using New Bounds of Positive Roots. + Nonlinear Analysis: Modelling and Control, Vol. 13, No. 3, 265-279, 2008. + + """ + if K.is_QQ: + (_, f), K = dup_clear_denoms(f, K, convert=True), K.get_ring() + elif not K.is_ZZ: + raise DomainError("isolation of real roots not supported over %s" % K) + + if dup_degree(f) <= 0: + return [] + + I_zero, f = _isolate_zero(f, K, inf, sup, basis=basis, sqf=False) + + _, factors = dup_sqf_list(f, K) + + if len(factors) == 1: + ((f, k),) = factors + + I_neg = dup_inner_isolate_negative_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast) + I_pos = dup_inner_isolate_positive_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast) + + I_neg = [ ((u, v), k) for u, v in I_neg ] + I_pos = [ ((u, v), k) for u, v in I_pos ] + else: + I_neg, I_pos = _real_isolate_and_disjoin(factors, K, + eps=eps, inf=inf, sup=sup, basis=basis, fast=fast) + + return sorted(I_neg + I_zero + I_pos) + +def dup_isolate_real_roots_list(polys, K, eps=None, inf=None, sup=None, strict=False, basis=False, fast=False): + """Isolate real roots of a list of polynomial using Vincent-Akritas-Strzebonski (VAS) CF approach. + + References + ========== + + .. [1] Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative + Study of Two Real Root Isolation Methods. Nonlinear Analysis: + Modelling and Control, Vol. 10, No. 4, 297-304, 2005. + .. [2] Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. + Vigklas: Improving the Performance of the Continued Fractions + Method Using New Bounds of Positive Roots. + Nonlinear Analysis: Modelling and Control, Vol. 13, No. 3, 265-279, 2008. + + """ + if K.is_QQ: + K, F, polys = K.get_ring(), K, polys[:] + + for i, p in enumerate(polys): + polys[i] = dup_clear_denoms(p, F, K, convert=True)[1] + elif not K.is_ZZ: + raise DomainError("isolation of real roots not supported over %s" % K) + + zeros, factors_dict = False, {} + + if (inf is None or inf <= 0) and (sup is None or 0 <= sup): + zeros, zero_indices = True, {} + + for i, p in enumerate(polys): + j, p = dup_terms_gcd(p, K) + + if zeros and j > 0: + zero_indices[i] = j + + for f, k in dup_factor_list(p, K)[1]: + f = tuple(f) + + if f not in factors_dict: + factors_dict[f] = {i: k} + else: + factors_dict[f][i] = k + + factors_list = [(list(f), indices) for f, indices in factors_dict.items()] + I_neg, I_pos = _real_isolate_and_disjoin(factors_list, K, eps=eps, + inf=inf, sup=sup, strict=strict, basis=basis, fast=fast) + + F = K.get_field() + + if not zeros or not zero_indices: + I_zero = [] + else: + if not basis: + I_zero = [((F.zero, F.zero), zero_indices)] + else: + I_zero = [((F.zero, F.zero), zero_indices, [K.one, K.zero])] + + return sorted(I_neg + I_zero + I_pos) + +def _disjoint_p(M, N, strict=False): + """Check if Mobius transforms define disjoint intervals. """ + a1, b1, c1, d1 = M + a2, b2, c2, d2 = N + + a1d1, b1c1 = a1*d1, b1*c1 + a2d2, b2c2 = a2*d2, b2*c2 + + if a1d1 == b1c1 and a2d2 == b2c2: + return True + + if a1d1 > b1c1: + a1, c1, b1, d1 = b1, d1, a1, c1 + + if a2d2 > b2c2: + a2, c2, b2, d2 = b2, d2, a2, c2 + + if not strict: + return a2*d1 >= c2*b1 or b2*c1 <= d2*a1 + else: + return a2*d1 > c2*b1 or b2*c1 < d2*a1 + +def _real_isolate_and_disjoin(factors, K, eps=None, inf=None, sup=None, strict=False, basis=False, fast=False): + """Isolate real roots of a list of polynomials and disjoin intervals. """ + I_pos, I_neg = [], [] + + for i, (f, k) in enumerate(factors): + for F, M in dup_inner_isolate_positive_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast, mobius=True): + I_pos.append((F, M, k, f)) + + for G, N in dup_inner_isolate_negative_roots(f, K, eps=eps, inf=inf, sup=sup, fast=fast, mobius=True): + I_neg.append((G, N, k, f)) + + for i, (f, M, k, F) in enumerate(I_pos): + for j, (g, N, m, G) in enumerate(I_pos[i + 1:]): + while not _disjoint_p(M, N, strict=strict): + f, M = dup_inner_refine_real_root(f, M, K, steps=1, fast=fast, mobius=True) + g, N = dup_inner_refine_real_root(g, N, K, steps=1, fast=fast, mobius=True) + + I_pos[i + j + 1] = (g, N, m, G) + + I_pos[i] = (f, M, k, F) + + for i, (f, M, k, F) in enumerate(I_neg): + for j, (g, N, m, G) in enumerate(I_neg[i + 1:]): + while not _disjoint_p(M, N, strict=strict): + f, M = dup_inner_refine_real_root(f, M, K, steps=1, fast=fast, mobius=True) + g, N = dup_inner_refine_real_root(g, N, K, steps=1, fast=fast, mobius=True) + + I_neg[i + j + 1] = (g, N, m, G) + + I_neg[i] = (f, M, k, F) + + if strict: + for i, (f, M, k, F) in enumerate(I_neg): + if not M[0]: + while not M[0]: + f, M = dup_inner_refine_real_root(f, M, K, steps=1, fast=fast, mobius=True) + + I_neg[i] = (f, M, k, F) + break + + for j, (g, N, m, G) in enumerate(I_pos): + if not N[0]: + while not N[0]: + g, N = dup_inner_refine_real_root(g, N, K, steps=1, fast=fast, mobius=True) + + I_pos[j] = (g, N, m, G) + break + + field = K.get_field() + + I_neg = [ (_mobius_to_interval(M, field), k, f) for (_, M, k, f) in I_neg ] + I_pos = [ (_mobius_to_interval(M, field), k, f) for (_, M, k, f) in I_pos ] + + I_neg = [((-v, -u), k, f) for ((u, v), k, f) in I_neg] + + if not basis: + I_neg = [((u, v), k) for ((u, v), k, _) in I_neg] + I_pos = [((u, v), k) for ((u, v), k, _) in I_pos] + + return I_neg, I_pos + +def dup_count_real_roots(f, K, inf=None, sup=None): + """Returns the number of distinct real roots of ``f`` in ``[inf, sup]``. """ + if dup_degree(f) <= 0: + return 0 + + if not K.is_Field: + R, K = K, K.get_field() + f = dup_convert(f, R, K) + + sturm = dup_sturm(f, K) + + if inf is None: + signs_inf = dup_sign_variations([ dup_LC(s, K)*(-1)**dup_degree(s) for s in sturm ], K) + else: + signs_inf = dup_sign_variations([ dup_eval(s, inf, K) for s in sturm ], K) + + if sup is None: + signs_sup = dup_sign_variations([ dup_LC(s, K) for s in sturm ], K) + else: + signs_sup = dup_sign_variations([ dup_eval(s, sup, K) for s in sturm ], K) + + count = abs(signs_inf - signs_sup) + + if inf is not None and not dup_eval(f, inf, K): + count += 1 + + return count + +OO = 'OO' # Origin of (re, im) coordinate system + +Q1 = 'Q1' # Quadrant #1 (++): re > 0 and im > 0 +Q2 = 'Q2' # Quadrant #2 (-+): re < 0 and im > 0 +Q3 = 'Q3' # Quadrant #3 (--): re < 0 and im < 0 +Q4 = 'Q4' # Quadrant #4 (+-): re > 0 and im < 0 + +A1 = 'A1' # Axis #1 (+0): re > 0 and im = 0 +A2 = 'A2' # Axis #2 (0+): re = 0 and im > 0 +A3 = 'A3' # Axis #3 (-0): re < 0 and im = 0 +A4 = 'A4' # Axis #4 (0-): re = 0 and im < 0 + +_rules_simple = { + # Q --> Q (same) => no change + (Q1, Q1): 0, + (Q2, Q2): 0, + (Q3, Q3): 0, + (Q4, Q4): 0, + + # A -- CCW --> Q => +1/4 (CCW) + (A1, Q1): 1, + (A2, Q2): 1, + (A3, Q3): 1, + (A4, Q4): 1, + + # A -- CW --> Q => -1/4 (CCW) + (A1, Q4): 2, + (A2, Q1): 2, + (A3, Q2): 2, + (A4, Q3): 2, + + # Q -- CCW --> A => +1/4 (CCW) + (Q1, A2): 3, + (Q2, A3): 3, + (Q3, A4): 3, + (Q4, A1): 3, + + # Q -- CW --> A => -1/4 (CCW) + (Q1, A1): 4, + (Q2, A2): 4, + (Q3, A3): 4, + (Q4, A4): 4, + + # Q -- CCW --> Q => +1/2 (CCW) + (Q1, Q2): +5, + (Q2, Q3): +5, + (Q3, Q4): +5, + (Q4, Q1): +5, + + # Q -- CW --> Q => -1/2 (CW) + (Q1, Q4): -5, + (Q2, Q1): -5, + (Q3, Q2): -5, + (Q4, Q3): -5, +} + +_rules_ambiguous = { + # A -- CCW --> Q => { +1/4 (CCW), -9/4 (CW) } + (A1, OO, Q1): -1, + (A2, OO, Q2): -1, + (A3, OO, Q3): -1, + (A4, OO, Q4): -1, + + # A -- CW --> Q => { -1/4 (CCW), +7/4 (CW) } + (A1, OO, Q4): -2, + (A2, OO, Q1): -2, + (A3, OO, Q2): -2, + (A4, OO, Q3): -2, + + # Q -- CCW --> A => { +1/4 (CCW), -9/4 (CW) } + (Q1, OO, A2): -3, + (Q2, OO, A3): -3, + (Q3, OO, A4): -3, + (Q4, OO, A1): -3, + + # Q -- CW --> A => { -1/4 (CCW), +7/4 (CW) } + (Q1, OO, A1): -4, + (Q2, OO, A2): -4, + (Q3, OO, A3): -4, + (Q4, OO, A4): -4, + + # A -- OO --> A => { +1 (CCW), -1 (CW) } + (A1, A3): 7, + (A2, A4): 7, + (A3, A1): 7, + (A4, A2): 7, + + (A1, OO, A3): 7, + (A2, OO, A4): 7, + (A3, OO, A1): 7, + (A4, OO, A2): 7, + + # Q -- DIA --> Q => { +1 (CCW), -1 (CW) } + (Q1, Q3): 8, + (Q2, Q4): 8, + (Q3, Q1): 8, + (Q4, Q2): 8, + + (Q1, OO, Q3): 8, + (Q2, OO, Q4): 8, + (Q3, OO, Q1): 8, + (Q4, OO, Q2): 8, + + # A --- R ---> A => { +1/2 (CCW), -3/2 (CW) } + (A1, A2): 9, + (A2, A3): 9, + (A3, A4): 9, + (A4, A1): 9, + + (A1, OO, A2): 9, + (A2, OO, A3): 9, + (A3, OO, A4): 9, + (A4, OO, A1): 9, + + # A --- L ---> A => { +3/2 (CCW), -1/2 (CW) } + (A1, A4): 10, + (A2, A1): 10, + (A3, A2): 10, + (A4, A3): 10, + + (A1, OO, A4): 10, + (A2, OO, A1): 10, + (A3, OO, A2): 10, + (A4, OO, A3): 10, + + # Q --- 1 ---> A => { +3/4 (CCW), -5/4 (CW) } + (Q1, A3): 11, + (Q2, A4): 11, + (Q3, A1): 11, + (Q4, A2): 11, + + (Q1, OO, A3): 11, + (Q2, OO, A4): 11, + (Q3, OO, A1): 11, + (Q4, OO, A2): 11, + + # Q --- 2 ---> A => { +5/4 (CCW), -3/4 (CW) } + (Q1, A4): 12, + (Q2, A1): 12, + (Q3, A2): 12, + (Q4, A3): 12, + + (Q1, OO, A4): 12, + (Q2, OO, A1): 12, + (Q3, OO, A2): 12, + (Q4, OO, A3): 12, + + # A --- 1 ---> Q => { +5/4 (CCW), -3/4 (CW) } + (A1, Q3): 13, + (A2, Q4): 13, + (A3, Q1): 13, + (A4, Q2): 13, + + (A1, OO, Q3): 13, + (A2, OO, Q4): 13, + (A3, OO, Q1): 13, + (A4, OO, Q2): 13, + + # A --- 2 ---> Q => { +3/4 (CCW), -5/4 (CW) } + (A1, Q2): 14, + (A2, Q3): 14, + (A3, Q4): 14, + (A4, Q1): 14, + + (A1, OO, Q2): 14, + (A2, OO, Q3): 14, + (A3, OO, Q4): 14, + (A4, OO, Q1): 14, + + # Q --> OO --> Q => { +1/2 (CCW), -3/2 (CW) } + (Q1, OO, Q2): 15, + (Q2, OO, Q3): 15, + (Q3, OO, Q4): 15, + (Q4, OO, Q1): 15, + + # Q --> OO --> Q => { +3/2 (CCW), -1/2 (CW) } + (Q1, OO, Q4): 16, + (Q2, OO, Q1): 16, + (Q3, OO, Q2): 16, + (Q4, OO, Q3): 16, + + # A --> OO --> A => { +2 (CCW), 0 (CW) } + (A1, OO, A1): 17, + (A2, OO, A2): 17, + (A3, OO, A3): 17, + (A4, OO, A4): 17, + + # Q --> OO --> Q => { +2 (CCW), 0 (CW) } + (Q1, OO, Q1): 18, + (Q2, OO, Q2): 18, + (Q3, OO, Q3): 18, + (Q4, OO, Q4): 18, +} + +_values = { + 0: [( 0, 1)], + 1: [(+1, 4)], + 2: [(-1, 4)], + 3: [(+1, 4)], + 4: [(-1, 4)], + -1: [(+9, 4), (+1, 4)], + -2: [(+7, 4), (-1, 4)], + -3: [(+9, 4), (+1, 4)], + -4: [(+7, 4), (-1, 4)], + +5: [(+1, 2)], + -5: [(-1, 2)], + 7: [(+1, 1), (-1, 1)], + 8: [(+1, 1), (-1, 1)], + 9: [(+1, 2), (-3, 2)], + 10: [(+3, 2), (-1, 2)], + 11: [(+3, 4), (-5, 4)], + 12: [(+5, 4), (-3, 4)], + 13: [(+5, 4), (-3, 4)], + 14: [(+3, 4), (-5, 4)], + 15: [(+1, 2), (-3, 2)], + 16: [(+3, 2), (-1, 2)], + 17: [(+2, 1), ( 0, 1)], + 18: [(+2, 1), ( 0, 1)], +} + +def _classify_point(re, im): + """Return the half-axis (or origin) on which (re, im) point is located. """ + if not re and not im: + return OO + + if not re: + if im > 0: + return A2 + else: + return A4 + elif not im: + if re > 0: + return A1 + else: + return A3 + +def _intervals_to_quadrants(intervals, f1, f2, s, t, F): + """Generate a sequence of extended quadrants from a list of critical points. """ + if not intervals: + return [] + + Q = [] + + if not f1: + (a, b), _, _ = intervals[0] + + if a == b == s: + if len(intervals) == 1: + if dup_eval(f2, t, F) > 0: + return [OO, A2] + else: + return [OO, A4] + else: + (a, _), _, _ = intervals[1] + + if dup_eval(f2, (s + a)/2, F) > 0: + Q.extend([OO, A2]) + f2_sgn = +1 + else: + Q.extend([OO, A4]) + f2_sgn = -1 + + intervals = intervals[1:] + else: + if dup_eval(f2, s, F) > 0: + Q.append(A2) + f2_sgn = +1 + else: + Q.append(A4) + f2_sgn = -1 + + for (a, _), indices, _ in intervals: + Q.append(OO) + + if indices[1] % 2 == 1: + f2_sgn = -f2_sgn + + if a != t: + if f2_sgn > 0: + Q.append(A2) + else: + Q.append(A4) + + return Q + + if not f2: + (a, b), _, _ = intervals[0] + + if a == b == s: + if len(intervals) == 1: + if dup_eval(f1, t, F) > 0: + return [OO, A1] + else: + return [OO, A3] + else: + (a, _), _, _ = intervals[1] + + if dup_eval(f1, (s + a)/2, F) > 0: + Q.extend([OO, A1]) + f1_sgn = +1 + else: + Q.extend([OO, A3]) + f1_sgn = -1 + + intervals = intervals[1:] + else: + if dup_eval(f1, s, F) > 0: + Q.append(A1) + f1_sgn = +1 + else: + Q.append(A3) + f1_sgn = -1 + + for (a, _), indices, _ in intervals: + Q.append(OO) + + if indices[0] % 2 == 1: + f1_sgn = -f1_sgn + + if a != t: + if f1_sgn > 0: + Q.append(A1) + else: + Q.append(A3) + + return Q + + re = dup_eval(f1, s, F) + im = dup_eval(f2, s, F) + + if not re or not im: + Q.append(_classify_point(re, im)) + + if len(intervals) == 1: + re = dup_eval(f1, t, F) + im = dup_eval(f2, t, F) + else: + (a, _), _, _ = intervals[1] + + re = dup_eval(f1, (s + a)/2, F) + im = dup_eval(f2, (s + a)/2, F) + + intervals = intervals[1:] + + if re > 0: + f1_sgn = +1 + else: + f1_sgn = -1 + + if im > 0: + f2_sgn = +1 + else: + f2_sgn = -1 + + sgn = { + (+1, +1): Q1, + (-1, +1): Q2, + (-1, -1): Q3, + (+1, -1): Q4, + } + + Q.append(sgn[(f1_sgn, f2_sgn)]) + + for (a, b), indices, _ in intervals: + if a == b: + re = dup_eval(f1, a, F) + im = dup_eval(f2, a, F) + + cls = _classify_point(re, im) + + if cls is not None: + Q.append(cls) + + if 0 in indices: + if indices[0] % 2 == 1: + f1_sgn = -f1_sgn + + if 1 in indices: + if indices[1] % 2 == 1: + f2_sgn = -f2_sgn + + if not (a == b and b == t): + Q.append(sgn[(f1_sgn, f2_sgn)]) + + return Q + +def _traverse_quadrants(Q_L1, Q_L2, Q_L3, Q_L4, exclude=None): + """Transform sequences of quadrants to a sequence of rules. """ + if exclude is True: + edges = [1, 1, 0, 0] + + corners = { + (0, 1): 1, + (1, 2): 1, + (2, 3): 0, + (3, 0): 1, + } + else: + edges = [0, 0, 0, 0] + + corners = { + (0, 1): 0, + (1, 2): 0, + (2, 3): 0, + (3, 0): 0, + } + + if exclude is not None and exclude is not True: + exclude = set(exclude) + + for i, edge in enumerate(['S', 'E', 'N', 'W']): + if edge in exclude: + edges[i] = 1 + + for i, corner in enumerate(['SW', 'SE', 'NE', 'NW']): + if corner in exclude: + corners[((i - 1) % 4, i)] = 1 + + QQ, rules = [Q_L1, Q_L2, Q_L3, Q_L4], [] + + for i, Q in enumerate(QQ): + if not Q: + continue + + if Q[-1] == OO: + Q = Q[:-1] + + if Q[0] == OO: + j, Q = (i - 1) % 4, Q[1:] + qq = (QQ[j][-2], OO, Q[0]) + + if qq in _rules_ambiguous: + rules.append((_rules_ambiguous[qq], corners[(j, i)])) + else: + raise NotImplementedError("3 element rule (corner): " + str(qq)) + + q1, k = Q[0], 1 + + while k < len(Q): + q2, k = Q[k], k + 1 + + if q2 != OO: + qq = (q1, q2) + + if qq in _rules_simple: + rules.append((_rules_simple[qq], 0)) + elif qq in _rules_ambiguous: + rules.append((_rules_ambiguous[qq], edges[i])) + else: + raise NotImplementedError("2 element rule (inside): " + str(qq)) + else: + qq, k = (q1, q2, Q[k]), k + 1 + + if qq in _rules_ambiguous: + rules.append((_rules_ambiguous[qq], edges[i])) + else: + raise NotImplementedError("3 element rule (edge): " + str(qq)) + + q1 = qq[-1] + + return rules + +def _reverse_intervals(intervals): + """Reverse intervals for traversal from right to left and from top to bottom. """ + return [ ((b, a), indices, f) for (a, b), indices, f in reversed(intervals) ] + +def _winding_number(T, field): + """Compute the winding number of the input polynomial, i.e. the number of roots. """ + return int(sum(field(*_values[t][i]) for t, i in T) / field(2)) + +def dup_count_complex_roots(f, K, inf=None, sup=None, exclude=None): + """Count all roots in [u + v*I, s + t*I] rectangle using Collins-Krandick algorithm. """ + if not K.is_ZZ and not K.is_QQ: + raise DomainError("complex root counting is not supported over %s" % K) + + if K.is_ZZ: + R, F = K, K.get_field() + else: + R, F = K.get_ring(), K + + f = dup_convert(f, K, F) + + if inf is None or sup is None: + _, lc = dup_degree(f), abs(dup_LC(f, F)) + B = 2*max(F.quo(abs(c), lc) for c in f) + + if inf is None: + (u, v) = (-B, -B) + else: + (u, v) = inf + + if sup is None: + (s, t) = (+B, +B) + else: + (s, t) = sup + + f1, f2 = dup_real_imag(f, F) + + f1L1F = dmp_eval_in(f1, v, 1, 1, F) + f2L1F = dmp_eval_in(f2, v, 1, 1, F) + + _, f1L1R = dup_clear_denoms(f1L1F, F, R, convert=True) + _, f2L1R = dup_clear_denoms(f2L1F, F, R, convert=True) + + f1L2F = dmp_eval_in(f1, s, 0, 1, F) + f2L2F = dmp_eval_in(f2, s, 0, 1, F) + + _, f1L2R = dup_clear_denoms(f1L2F, F, R, convert=True) + _, f2L2R = dup_clear_denoms(f2L2F, F, R, convert=True) + + f1L3F = dmp_eval_in(f1, t, 1, 1, F) + f2L3F = dmp_eval_in(f2, t, 1, 1, F) + + _, f1L3R = dup_clear_denoms(f1L3F, F, R, convert=True) + _, f2L3R = dup_clear_denoms(f2L3F, F, R, convert=True) + + f1L4F = dmp_eval_in(f1, u, 0, 1, F) + f2L4F = dmp_eval_in(f2, u, 0, 1, F) + + _, f1L4R = dup_clear_denoms(f1L4F, F, R, convert=True) + _, f2L4R = dup_clear_denoms(f2L4F, F, R, convert=True) + + S_L1 = [f1L1R, f2L1R] + S_L2 = [f1L2R, f2L2R] + S_L3 = [f1L3R, f2L3R] + S_L4 = [f1L4R, f2L4R] + + I_L1 = dup_isolate_real_roots_list(S_L1, R, inf=u, sup=s, fast=True, basis=True, strict=True) + I_L2 = dup_isolate_real_roots_list(S_L2, R, inf=v, sup=t, fast=True, basis=True, strict=True) + I_L3 = dup_isolate_real_roots_list(S_L3, R, inf=u, sup=s, fast=True, basis=True, strict=True) + I_L4 = dup_isolate_real_roots_list(S_L4, R, inf=v, sup=t, fast=True, basis=True, strict=True) + + I_L3 = _reverse_intervals(I_L3) + I_L4 = _reverse_intervals(I_L4) + + Q_L1 = _intervals_to_quadrants(I_L1, f1L1F, f2L1F, u, s, F) + Q_L2 = _intervals_to_quadrants(I_L2, f1L2F, f2L2F, v, t, F) + Q_L3 = _intervals_to_quadrants(I_L3, f1L3F, f2L3F, s, u, F) + Q_L4 = _intervals_to_quadrants(I_L4, f1L4F, f2L4F, t, v, F) + + T = _traverse_quadrants(Q_L1, Q_L2, Q_L3, Q_L4, exclude=exclude) + + return _winding_number(T, F) + +def _vertical_bisection(N, a, b, I, Q, F1, F2, f1, f2, F): + """Vertical bisection step in Collins-Krandick root isolation algorithm. """ + (u, v), (s, t) = a, b + + I_L1, I_L2, I_L3, I_L4 = I + Q_L1, Q_L2, Q_L3, Q_L4 = Q + + f1L1F, f1L2F, f1L3F, f1L4F = F1 + f2L1F, f2L2F, f2L3F, f2L4F = F2 + + x = (u + s) / 2 + + f1V = dmp_eval_in(f1, x, 0, 1, F) + f2V = dmp_eval_in(f2, x, 0, 1, F) + + I_V = dup_isolate_real_roots_list([f1V, f2V], F, inf=v, sup=t, fast=True, strict=True, basis=True) + + I_L1_L, I_L1_R = [], [] + I_L2_L, I_L2_R = I_V, I_L2 + I_L3_L, I_L3_R = [], [] + I_L4_L, I_L4_R = I_L4, _reverse_intervals(I_V) + + for I in I_L1: + (a, b), indices, h = I + + if a == b: + if a == x: + I_L1_L.append(I) + I_L1_R.append(I) + elif a < x: + I_L1_L.append(I) + else: + I_L1_R.append(I) + else: + if b <= x: + I_L1_L.append(I) + elif a >= x: + I_L1_R.append(I) + else: + a, b = dup_refine_real_root(h, a, b, F.get_ring(), disjoint=x, fast=True) + + if b <= x: + I_L1_L.append(((a, b), indices, h)) + if a >= x: + I_L1_R.append(((a, b), indices, h)) + + for I in I_L3: + (b, a), indices, h = I + + if a == b: + if a == x: + I_L3_L.append(I) + I_L3_R.append(I) + elif a < x: + I_L3_L.append(I) + else: + I_L3_R.append(I) + else: + if b <= x: + I_L3_L.append(I) + elif a >= x: + I_L3_R.append(I) + else: + a, b = dup_refine_real_root(h, a, b, F.get_ring(), disjoint=x, fast=True) + + if b <= x: + I_L3_L.append(((b, a), indices, h)) + if a >= x: + I_L3_R.append(((b, a), indices, h)) + + Q_L1_L = _intervals_to_quadrants(I_L1_L, f1L1F, f2L1F, u, x, F) + Q_L2_L = _intervals_to_quadrants(I_L2_L, f1V, f2V, v, t, F) + Q_L3_L = _intervals_to_quadrants(I_L3_L, f1L3F, f2L3F, x, u, F) + Q_L4_L = Q_L4 + + Q_L1_R = _intervals_to_quadrants(I_L1_R, f1L1F, f2L1F, x, s, F) + Q_L2_R = Q_L2 + Q_L3_R = _intervals_to_quadrants(I_L3_R, f1L3F, f2L3F, s, x, F) + Q_L4_R = _intervals_to_quadrants(I_L4_R, f1V, f2V, t, v, F) + + T_L = _traverse_quadrants(Q_L1_L, Q_L2_L, Q_L3_L, Q_L4_L, exclude=True) + T_R = _traverse_quadrants(Q_L1_R, Q_L2_R, Q_L3_R, Q_L4_R, exclude=True) + + N_L = _winding_number(T_L, F) + N_R = _winding_number(T_R, F) + + I_L = (I_L1_L, I_L2_L, I_L3_L, I_L4_L) + Q_L = (Q_L1_L, Q_L2_L, Q_L3_L, Q_L4_L) + + I_R = (I_L1_R, I_L2_R, I_L3_R, I_L4_R) + Q_R = (Q_L1_R, Q_L2_R, Q_L3_R, Q_L4_R) + + F1_L = (f1L1F, f1V, f1L3F, f1L4F) + F2_L = (f2L1F, f2V, f2L3F, f2L4F) + + F1_R = (f1L1F, f1L2F, f1L3F, f1V) + F2_R = (f2L1F, f2L2F, f2L3F, f2V) + + a, b = (u, v), (x, t) + c, d = (x, v), (s, t) + + D_L = (N_L, a, b, I_L, Q_L, F1_L, F2_L) + D_R = (N_R, c, d, I_R, Q_R, F1_R, F2_R) + + return D_L, D_R + +def _horizontal_bisection(N, a, b, I, Q, F1, F2, f1, f2, F): + """Horizontal bisection step in Collins-Krandick root isolation algorithm. """ + (u, v), (s, t) = a, b + + I_L1, I_L2, I_L3, I_L4 = I + Q_L1, Q_L2, Q_L3, Q_L4 = Q + + f1L1F, f1L2F, f1L3F, f1L4F = F1 + f2L1F, f2L2F, f2L3F, f2L4F = F2 + + y = (v + t) / 2 + + f1H = dmp_eval_in(f1, y, 1, 1, F) + f2H = dmp_eval_in(f2, y, 1, 1, F) + + I_H = dup_isolate_real_roots_list([f1H, f2H], F, inf=u, sup=s, fast=True, strict=True, basis=True) + + I_L1_B, I_L1_U = I_L1, I_H + I_L2_B, I_L2_U = [], [] + I_L3_B, I_L3_U = _reverse_intervals(I_H), I_L3 + I_L4_B, I_L4_U = [], [] + + for I in I_L2: + (a, b), indices, h = I + + if a == b: + if a == y: + I_L2_B.append(I) + I_L2_U.append(I) + elif a < y: + I_L2_B.append(I) + else: + I_L2_U.append(I) + else: + if b <= y: + I_L2_B.append(I) + elif a >= y: + I_L2_U.append(I) + else: + a, b = dup_refine_real_root(h, a, b, F.get_ring(), disjoint=y, fast=True) + + if b <= y: + I_L2_B.append(((a, b), indices, h)) + if a >= y: + I_L2_U.append(((a, b), indices, h)) + + for I in I_L4: + (b, a), indices, h = I + + if a == b: + if a == y: + I_L4_B.append(I) + I_L4_U.append(I) + elif a < y: + I_L4_B.append(I) + else: + I_L4_U.append(I) + else: + if b <= y: + I_L4_B.append(I) + elif a >= y: + I_L4_U.append(I) + else: + a, b = dup_refine_real_root(h, a, b, F.get_ring(), disjoint=y, fast=True) + + if b <= y: + I_L4_B.append(((b, a), indices, h)) + if a >= y: + I_L4_U.append(((b, a), indices, h)) + + Q_L1_B = Q_L1 + Q_L2_B = _intervals_to_quadrants(I_L2_B, f1L2F, f2L2F, v, y, F) + Q_L3_B = _intervals_to_quadrants(I_L3_B, f1H, f2H, s, u, F) + Q_L4_B = _intervals_to_quadrants(I_L4_B, f1L4F, f2L4F, y, v, F) + + Q_L1_U = _intervals_to_quadrants(I_L1_U, f1H, f2H, u, s, F) + Q_L2_U = _intervals_to_quadrants(I_L2_U, f1L2F, f2L2F, y, t, F) + Q_L3_U = Q_L3 + Q_L4_U = _intervals_to_quadrants(I_L4_U, f1L4F, f2L4F, t, y, F) + + T_B = _traverse_quadrants(Q_L1_B, Q_L2_B, Q_L3_B, Q_L4_B, exclude=True) + T_U = _traverse_quadrants(Q_L1_U, Q_L2_U, Q_L3_U, Q_L4_U, exclude=True) + + N_B = _winding_number(T_B, F) + N_U = _winding_number(T_U, F) + + I_B = (I_L1_B, I_L2_B, I_L3_B, I_L4_B) + Q_B = (Q_L1_B, Q_L2_B, Q_L3_B, Q_L4_B) + + I_U = (I_L1_U, I_L2_U, I_L3_U, I_L4_U) + Q_U = (Q_L1_U, Q_L2_U, Q_L3_U, Q_L4_U) + + F1_B = (f1L1F, f1L2F, f1H, f1L4F) + F2_B = (f2L1F, f2L2F, f2H, f2L4F) + + F1_U = (f1H, f1L2F, f1L3F, f1L4F) + F2_U = (f2H, f2L2F, f2L3F, f2L4F) + + a, b = (u, v), (s, y) + c, d = (u, y), (s, t) + + D_B = (N_B, a, b, I_B, Q_B, F1_B, F2_B) + D_U = (N_U, c, d, I_U, Q_U, F1_U, F2_U) + + return D_B, D_U + +def _depth_first_select(rectangles): + """Find a rectangle of minimum area for bisection. """ + min_area, j = None, None + + for i, (_, (u, v), (s, t), _, _, _, _) in enumerate(rectangles): + area = (s - u)*(t - v) + + if min_area is None or area < min_area: + min_area, j = area, i + + return rectangles.pop(j) + +def _rectangle_small_p(a, b, eps): + """Return ``True`` if the given rectangle is small enough. """ + (u, v), (s, t) = a, b + + if eps is not None: + return s - u < eps and t - v < eps + else: + return True + +def dup_isolate_complex_roots_sqf(f, K, eps=None, inf=None, sup=None, blackbox=False): + """Isolate complex roots of a square-free polynomial using Collins-Krandick algorithm. """ + if not K.is_ZZ and not K.is_QQ: + raise DomainError("isolation of complex roots is not supported over %s" % K) + + if dup_degree(f) <= 0: + return [] + + if K.is_ZZ: + F = K.get_field() + else: + F = K + + f = dup_convert(f, K, F) + + lc = abs(dup_LC(f, F)) + B = 2*max(F.quo(abs(c), lc) for c in f) + + (u, v), (s, t) = (-B, F.zero), (B, B) + + if inf is not None: + u = inf + + if sup is not None: + s = sup + + if v < 0 or t <= v or s <= u: + raise ValueError("not a valid complex isolation rectangle") + + f1, f2 = dup_real_imag(f, F) + + f1L1 = dmp_eval_in(f1, v, 1, 1, F) + f2L1 = dmp_eval_in(f2, v, 1, 1, F) + + f1L2 = dmp_eval_in(f1, s, 0, 1, F) + f2L2 = dmp_eval_in(f2, s, 0, 1, F) + + f1L3 = dmp_eval_in(f1, t, 1, 1, F) + f2L3 = dmp_eval_in(f2, t, 1, 1, F) + + f1L4 = dmp_eval_in(f1, u, 0, 1, F) + f2L4 = dmp_eval_in(f2, u, 0, 1, F) + + S_L1 = [f1L1, f2L1] + S_L2 = [f1L2, f2L2] + S_L3 = [f1L3, f2L3] + S_L4 = [f1L4, f2L4] + + I_L1 = dup_isolate_real_roots_list(S_L1, F, inf=u, sup=s, fast=True, strict=True, basis=True) + I_L2 = dup_isolate_real_roots_list(S_L2, F, inf=v, sup=t, fast=True, strict=True, basis=True) + I_L3 = dup_isolate_real_roots_list(S_L3, F, inf=u, sup=s, fast=True, strict=True, basis=True) + I_L4 = dup_isolate_real_roots_list(S_L4, F, inf=v, sup=t, fast=True, strict=True, basis=True) + + I_L3 = _reverse_intervals(I_L3) + I_L4 = _reverse_intervals(I_L4) + + Q_L1 = _intervals_to_quadrants(I_L1, f1L1, f2L1, u, s, F) + Q_L2 = _intervals_to_quadrants(I_L2, f1L2, f2L2, v, t, F) + Q_L3 = _intervals_to_quadrants(I_L3, f1L3, f2L3, s, u, F) + Q_L4 = _intervals_to_quadrants(I_L4, f1L4, f2L4, t, v, F) + + T = _traverse_quadrants(Q_L1, Q_L2, Q_L3, Q_L4) + N = _winding_number(T, F) + + if not N: + return [] + + I = (I_L1, I_L2, I_L3, I_L4) + Q = (Q_L1, Q_L2, Q_L3, Q_L4) + + F1 = (f1L1, f1L2, f1L3, f1L4) + F2 = (f2L1, f2L2, f2L3, f2L4) + + rectangles, roots = [(N, (u, v), (s, t), I, Q, F1, F2)], [] + + while rectangles: + N, (u, v), (s, t), I, Q, F1, F2 = _depth_first_select(rectangles) + + if s - u > t - v: + D_L, D_R = _vertical_bisection(N, (u, v), (s, t), I, Q, F1, F2, f1, f2, F) + + N_L, a, b, I_L, Q_L, F1_L, F2_L = D_L + N_R, c, d, I_R, Q_R, F1_R, F2_R = D_R + + if N_L >= 1: + if N_L == 1 and _rectangle_small_p(a, b, eps): + roots.append(ComplexInterval(a, b, I_L, Q_L, F1_L, F2_L, f1, f2, F)) + else: + rectangles.append(D_L) + + if N_R >= 1: + if N_R == 1 and _rectangle_small_p(c, d, eps): + roots.append(ComplexInterval(c, d, I_R, Q_R, F1_R, F2_R, f1, f2, F)) + else: + rectangles.append(D_R) + else: + D_B, D_U = _horizontal_bisection(N, (u, v), (s, t), I, Q, F1, F2, f1, f2, F) + + N_B, a, b, I_B, Q_B, F1_B, F2_B = D_B + N_U, c, d, I_U, Q_U, F1_U, F2_U = D_U + + if N_B >= 1: + if N_B == 1 and _rectangle_small_p(a, b, eps): + roots.append(ComplexInterval( + a, b, I_B, Q_B, F1_B, F2_B, f1, f2, F)) + else: + rectangles.append(D_B) + + if N_U >= 1: + if N_U == 1 and _rectangle_small_p(c, d, eps): + roots.append(ComplexInterval( + c, d, I_U, Q_U, F1_U, F2_U, f1, f2, F)) + else: + rectangles.append(D_U) + + _roots, roots = sorted(roots, key=lambda r: (r.ax, r.ay)), [] + + for root in _roots: + roots.extend([root.conjugate(), root]) + + if blackbox: + return roots + else: + return [ r.as_tuple() for r in roots ] + +def dup_isolate_all_roots_sqf(f, K, eps=None, inf=None, sup=None, fast=False, blackbox=False): + """Isolate real and complex roots of a square-free polynomial ``f``. """ + return ( + dup_isolate_real_roots_sqf( f, K, eps=eps, inf=inf, sup=sup, fast=fast, blackbox=blackbox), + dup_isolate_complex_roots_sqf(f, K, eps=eps, inf=inf, sup=sup, blackbox=blackbox)) + +def dup_isolate_all_roots(f, K, eps=None, inf=None, sup=None, fast=False): + """Isolate real and complex roots of a non-square-free polynomial ``f``. """ + if not K.is_ZZ and not K.is_QQ: + raise DomainError("isolation of real and complex roots is not supported over %s" % K) + + _, factors = dup_sqf_list(f, K) + + if len(factors) == 1: + ((f, k),) = factors + + real_part, complex_part = dup_isolate_all_roots_sqf( + f, K, eps=eps, inf=inf, sup=sup, fast=fast) + + real_part = [ ((a, b), k) for (a, b) in real_part ] + complex_part = [ ((a, b), k) for (a, b) in complex_part ] + + return real_part, complex_part + else: + raise NotImplementedError( "only trivial square-free polynomials are supported") + +class RealInterval: + """A fully qualified representation of a real isolation interval. """ + + def __init__(self, data, f, dom): + """Initialize new real interval with complete information. """ + if len(data) == 2: + s, t = data + + self.neg = False + + if s < 0: + if t <= 0: + f, s, t, self.neg = dup_mirror(f, dom), -t, -s, True + else: + raise ValueError("Cannot refine a real root in (%s, %s)" % (s, t)) + + a, b, c, d = _mobius_from_interval((s, t), dom.get_field()) + + f = dup_transform(f, dup_strip([a, b]), + dup_strip([c, d]), dom) + + self.mobius = a, b, c, d + else: + self.mobius = data[:-1] + self.neg = data[-1] + + self.f, self.dom = f, dom + + @property + def func(self): + return RealInterval + + @property + def args(self): + i = self + return (i.mobius + (i.neg,), i.f, i.dom) + + def __eq__(self, other): + if type(other) is not type(self): + return False + return self.args == other.args + + @property + def a(self): + """Return the position of the left end. """ + field = self.dom.get_field() + a, b, c, d = self.mobius + + if not self.neg: + if a*d < b*c: + return field(a, c) + return field(b, d) + else: + if a*d > b*c: + return -field(a, c) + return -field(b, d) + + @property + def b(self): + """Return the position of the right end. """ + was = self.neg + self.neg = not was + rv = -self.a + self.neg = was + return rv + + @property + def dx(self): + """Return width of the real isolating interval. """ + return self.b - self.a + + @property + def center(self): + """Return the center of the real isolating interval. """ + return (self.a + self.b)/2 + + @property + def max_denom(self): + """Return the largest denominator occurring in either endpoint. """ + return max(self.a.denominator, self.b.denominator) + + def as_tuple(self): + """Return tuple representation of real isolating interval. """ + return (self.a, self.b) + + def __repr__(self): + return "(%s, %s)" % (self.a, self.b) + + def __contains__(self, item): + """ + Say whether a complex number belongs to this real interval. + + Parameters + ========== + + item : pair (re, im) or number re + Either a pair giving the real and imaginary parts of the number, + or else a real number. + + """ + if isinstance(item, tuple): + re, im = item + else: + re, im = item, 0 + return im == 0 and self.a <= re <= self.b + + def is_disjoint(self, other): + """Return ``True`` if two isolation intervals are disjoint. """ + if isinstance(other, RealInterval): + return (self.b < other.a or other.b < self.a) + assert isinstance(other, ComplexInterval) + return (self.b < other.ax or other.bx < self.a + or other.ay*other.by > 0) + + def _inner_refine(self): + """Internal one step real root refinement procedure. """ + if self.mobius is None: + return self + + f, mobius = dup_inner_refine_real_root( + self.f, self.mobius, self.dom, steps=1, mobius=True) + + return RealInterval(mobius + (self.neg,), f, self.dom) + + def refine_disjoint(self, other): + """Refine an isolating interval until it is disjoint with another one. """ + expr = self + while not expr.is_disjoint(other): + expr, other = expr._inner_refine(), other._inner_refine() + + return expr, other + + def refine_size(self, dx): + """Refine an isolating interval until it is of sufficiently small size. """ + expr = self + while not (expr.dx < dx): + expr = expr._inner_refine() + + return expr + + def refine_step(self, steps=1): + """Perform several steps of real root refinement algorithm. """ + expr = self + for _ in range(steps): + expr = expr._inner_refine() + + return expr + + def refine(self): + """Perform one step of real root refinement algorithm. """ + return self._inner_refine() + + +class ComplexInterval: + """A fully qualified representation of a complex isolation interval. + The printed form is shown as (ax, bx) x (ay, by) where (ax, ay) + and (bx, by) are the coordinates of the southwest and northeast + corners of the interval's rectangle, respectively. + + Examples + ======== + + >>> from sympy import CRootOf, S + >>> from sympy.abc import x + >>> CRootOf.clear_cache() # for doctest reproducibility + >>> root = CRootOf(x**10 - 2*x + 3, 9) + >>> i = root._get_interval(); i + (3/64, 3/32) x (9/8, 75/64) + + The real part of the root lies within the range [0, 3/4] while + the imaginary part lies within the range [9/8, 3/2]: + + >>> root.n(3) + 0.0766 + 1.14*I + + The width of the ranges in the x and y directions on the complex + plane are: + + >>> i.dx, i.dy + (3/64, 3/64) + + The center of the range is + + >>> i.center + (9/128, 147/128) + + The northeast coordinate of the rectangle bounding the root in the + complex plane is given by attribute b and the x and y components + are accessed by bx and by: + + >>> i.b, i.bx, i.by + ((3/32, 75/64), 3/32, 75/64) + + The southwest coordinate is similarly given by i.a + + >>> i.a, i.ax, i.ay + ((3/64, 9/8), 3/64, 9/8) + + Although the interval prints to show only the real and imaginary + range of the root, all the information of the underlying root + is contained as properties of the interval. + + For example, an interval with a nonpositive imaginary range is + considered to be the conjugate. Since the y values of y are in the + range [0, 1/4] it is not the conjugate: + + >>> i.conj + False + + The conjugate's interval is + + >>> ic = i.conjugate(); ic + (3/64, 3/32) x (-75/64, -9/8) + + NOTE: the values printed still represent the x and y range + in which the root -- conjugate, in this case -- is located, + but the underlying a and b values of a root and its conjugate + are the same: + + >>> assert i.a == ic.a and i.b == ic.b + + What changes are the reported coordinates of the bounding rectangle: + + >>> (i.ax, i.ay), (i.bx, i.by) + ((3/64, 9/8), (3/32, 75/64)) + >>> (ic.ax, ic.ay), (ic.bx, ic.by) + ((3/64, -75/64), (3/32, -9/8)) + + The interval can be refined once: + + >>> i # for reference, this is the current interval + (3/64, 3/32) x (9/8, 75/64) + + >>> i.refine() + (3/64, 3/32) x (9/8, 147/128) + + Several refinement steps can be taken: + + >>> i.refine_step(2) # 2 steps + (9/128, 3/32) x (9/8, 147/128) + + It is also possible to refine to a given tolerance: + + >>> tol = min(i.dx, i.dy)/2 + >>> i.refine_size(tol) + (9/128, 21/256) x (9/8, 291/256) + + A disjoint interval is one whose bounding rectangle does not + overlap with another. An interval, necessarily, is not disjoint with + itself, but any interval is disjoint with a conjugate since the + conjugate rectangle will always be in the lower half of the complex + plane and the non-conjugate in the upper half: + + >>> i.is_disjoint(i), i.is_disjoint(i.conjugate()) + (False, True) + + The following interval j is not disjoint from i: + + >>> close = CRootOf(x**10 - 2*x + 300/S(101), 9) + >>> j = close._get_interval(); j + (75/1616, 75/808) x (225/202, 1875/1616) + >>> i.is_disjoint(j) + False + + The two can be made disjoint, however: + + >>> newi, newj = i.refine_disjoint(j) + >>> newi + (39/512, 159/2048) x (2325/2048, 4653/4096) + >>> newj + (3975/51712, 2025/25856) x (29325/25856, 117375/103424) + + Even though the real ranges overlap, the imaginary do not, so + the roots have been resolved as distinct. Intervals are disjoint + when either the real or imaginary component of the intervals is + distinct. In the case above, the real components have not been + resolved (so we do not know, yet, which root has the smaller real + part) but the imaginary part of ``close`` is larger than ``root``: + + >>> close.n(3) + 0.0771 + 1.13*I + >>> root.n(3) + 0.0766 + 1.14*I + """ + + def __init__(self, a, b, I, Q, F1, F2, f1, f2, dom, conj=False): + """Initialize new complex interval with complete information. """ + # a and b are the SW and NE corner of the bounding interval, + # (ax, ay) and (bx, by), respectively, for the NON-CONJUGATE + # root (the one with the positive imaginary part); when working + # with the conjugate, the a and b value are still non-negative + # but the ay, by are reversed and have oppositite sign + self.a, self.b = a, b + self.I, self.Q = I, Q + + self.f1, self.F1 = f1, F1 + self.f2, self.F2 = f2, F2 + + self.dom = dom + self.conj = conj + + @property + def func(self): + return ComplexInterval + + @property + def args(self): + i = self + return (i.a, i.b, i.I, i.Q, i.F1, i.F2, i.f1, i.f2, i.dom, i.conj) + + def __eq__(self, other): + if type(other) is not type(self): + return False + return self.args == other.args + + @property + def ax(self): + """Return ``x`` coordinate of south-western corner. """ + return self.a[0] + + @property + def ay(self): + """Return ``y`` coordinate of south-western corner. """ + if not self.conj: + return self.a[1] + else: + return -self.b[1] + + @property + def bx(self): + """Return ``x`` coordinate of north-eastern corner. """ + return self.b[0] + + @property + def by(self): + """Return ``y`` coordinate of north-eastern corner. """ + if not self.conj: + return self.b[1] + else: + return -self.a[1] + + @property + def dx(self): + """Return width of the complex isolating interval. """ + return self.b[0] - self.a[0] + + @property + def dy(self): + """Return height of the complex isolating interval. """ + return self.b[1] - self.a[1] + + @property + def center(self): + """Return the center of the complex isolating interval. """ + return ((self.ax + self.bx)/2, (self.ay + self.by)/2) + + @property + def max_denom(self): + """Return the largest denominator occurring in either endpoint. """ + return max(self.ax.denominator, self.bx.denominator, + self.ay.denominator, self.by.denominator) + + def as_tuple(self): + """Return tuple representation of the complex isolating + interval's SW and NE corners, respectively. """ + return ((self.ax, self.ay), (self.bx, self.by)) + + def __repr__(self): + return "(%s, %s) x (%s, %s)" % (self.ax, self.bx, self.ay, self.by) + + def conjugate(self): + """This complex interval really is located in lower half-plane. """ + return ComplexInterval(self.a, self.b, self.I, self.Q, + self.F1, self.F2, self.f1, self.f2, self.dom, conj=True) + + def __contains__(self, item): + """ + Say whether a complex number belongs to this complex rectangular + region. + + Parameters + ========== + + item : pair (re, im) or number re + Either a pair giving the real and imaginary parts of the number, + or else a real number. + + """ + if isinstance(item, tuple): + re, im = item + else: + re, im = item, 0 + return self.ax <= re <= self.bx and self.ay <= im <= self.by + + def is_disjoint(self, other): + """Return ``True`` if two isolation intervals are disjoint. """ + if isinstance(other, RealInterval): + return other.is_disjoint(self) + if self.conj != other.conj: # above and below real axis + return True + re_distinct = (self.bx < other.ax or other.bx < self.ax) + if re_distinct: + return True + im_distinct = (self.by < other.ay or other.by < self.ay) + return im_distinct + + def _inner_refine(self): + """Internal one step complex root refinement procedure. """ + (u, v), (s, t) = self.a, self.b + + I, Q = self.I, self.Q + + f1, F1 = self.f1, self.F1 + f2, F2 = self.f2, self.F2 + + dom = self.dom + + if s - u > t - v: + D_L, D_R = _vertical_bisection(1, (u, v), (s, t), I, Q, F1, F2, f1, f2, dom) + + if D_L[0] == 1: + _, a, b, I, Q, F1, F2 = D_L + else: + _, a, b, I, Q, F1, F2 = D_R + else: + D_B, D_U = _horizontal_bisection(1, (u, v), (s, t), I, Q, F1, F2, f1, f2, dom) + + if D_B[0] == 1: + _, a, b, I, Q, F1, F2 = D_B + else: + _, a, b, I, Q, F1, F2 = D_U + + return ComplexInterval(a, b, I, Q, F1, F2, f1, f2, dom, self.conj) + + def refine_disjoint(self, other): + """Refine an isolating interval until it is disjoint with another one. """ + expr = self + while not expr.is_disjoint(other): + expr, other = expr._inner_refine(), other._inner_refine() + + return expr, other + + def refine_size(self, dx, dy=None): + """Refine an isolating interval until it is of sufficiently small size. """ + if dy is None: + dy = dx + expr = self + while not (expr.dx < dx and expr.dy < dy): + expr = expr._inner_refine() + + return expr + + def refine_step(self, steps=1): + """Perform several steps of complex root refinement algorithm. """ + expr = self + for _ in range(steps): + expr = expr._inner_refine() + + return expr + + def refine(self): + """Perform one step of complex root refinement algorithm. """ + return self._inner_refine() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootoftools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootoftools.py new file mode 100644 index 0000000000000000000000000000000000000000..d68d8b008281c7e9b5aac618c6c76f74fa236d9e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/rootoftools.py @@ -0,0 +1,1298 @@ +"""Implementation of RootOf class and related tools. """ + + + +from sympy.core.basic import Basic +from sympy.core import (S, Expr, Integer, Float, I, oo, Add, Lambda, + symbols, sympify, Rational, Dummy) +from sympy.core.cache import cacheit +from sympy.core.relational import is_le +from sympy.core.sorting import ordered +from sympy.polys.domains import QQ +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + GeneratorsNeeded, + PolynomialError, + DomainError) +from sympy.polys.polyfuncs import symmetrize, viete +from sympy.polys.polyroots import ( + roots_linear, roots_quadratic, roots_binomial, + preprocess_roots, roots) +from sympy.polys.polytools import Poly, PurePoly, factor +from sympy.polys.rationaltools import together +from sympy.polys.rootisolation import ( + dup_isolate_complex_roots_sqf, + dup_isolate_real_roots_sqf) +from sympy.utilities import lambdify, public, sift, numbered_symbols + +from mpmath import mpf, mpc, findroot, workprec +from mpmath.libmp.libmpf import dps_to_prec, prec_to_dps +from sympy.multipledispatch import dispatch +from itertools import chain + + +__all__ = ['CRootOf'] + + + +class _pure_key_dict: + """A minimal dictionary that makes sure that the key is a + univariate PurePoly instance. + + Examples + ======== + + Only the following actions are guaranteed: + + >>> from sympy.polys.rootoftools import _pure_key_dict + >>> from sympy import PurePoly + >>> from sympy.abc import x, y + + 1) creation + + >>> P = _pure_key_dict() + + 2) assignment for a PurePoly or univariate polynomial + + >>> P[x] = 1 + >>> P[PurePoly(x - y, x)] = 2 + + 3) retrieval based on PurePoly key comparison (use this + instead of the get method) + + >>> P[y] + 1 + + 4) KeyError when trying to retrieve a nonexisting key + + >>> P[y + 1] + Traceback (most recent call last): + ... + KeyError: PurePoly(y + 1, y, domain='ZZ') + + 5) ability to query with ``in`` + + >>> x + 1 in P + False + + NOTE: this is a *not* a dictionary. It is a very basic object + for internal use that makes sure to always address its cache + via PurePoly instances. It does not, for example, implement + ``get`` or ``setdefault``. + """ + def __init__(self): + self._dict = {} + + def __getitem__(self, k): + if not isinstance(k, PurePoly): + if not (isinstance(k, Expr) and len(k.free_symbols) == 1): + raise KeyError + k = PurePoly(k, expand=False) + return self._dict[k] + + def __setitem__(self, k, v): + if not isinstance(k, PurePoly): + if not (isinstance(k, Expr) and len(k.free_symbols) == 1): + raise ValueError('expecting univariate expression') + k = PurePoly(k, expand=False) + self._dict[k] = v + + def __contains__(self, k): + try: + self[k] + return True + except KeyError: + return False + +_reals_cache = _pure_key_dict() +_complexes_cache = _pure_key_dict() + + +def _pure_factors(poly): + _, factors = poly.factor_list() + return [(PurePoly(f, expand=False), m) for f, m in factors] + + +def _imag_count_of_factor(f): + """Return the number of imaginary roots for irreducible + univariate polynomial ``f``. + """ + terms = [(i, j) for (i,), j in f.terms()] + if any(i % 2 for i, j in terms): + return 0 + # update signs + even = [(i, I**i*j) for i, j in terms] + even = Poly.from_dict(dict(even), Dummy('x')) + return int(even.count_roots(-oo, oo)) + + +@public +def rootof(f, x, index=None, radicals=True, expand=True): + """An indexed root of a univariate polynomial. + + Returns either a :obj:`ComplexRootOf` object or an explicit + expression involving radicals. + + Parameters + ========== + + f : Expr + Univariate polynomial. + x : Symbol, optional + Generator for ``f``. + index : int or Integer + radicals : bool + Return a radical expression if possible. + expand : bool + Expand ``f``. + """ + return CRootOf(f, x, index=index, radicals=radicals, expand=expand) + + +@public +class RootOf(Expr): + """Represents a root of a univariate polynomial. + + Base class for roots of different kinds of polynomials. + Only complex roots are currently supported. + """ + + __slots__ = ('poly',) + + def __new__(cls, f, x, index=None, radicals=True, expand=True): + """Construct a new ``CRootOf`` object for ``k``-th root of ``f``.""" + return rootof(f, x, index=index, radicals=radicals, expand=expand) + +@public +class ComplexRootOf(RootOf): + """Represents an indexed complex root of a polynomial. + + Roots of a univariate polynomial separated into disjoint + real or complex intervals and indexed in a fixed order: + + * real roots come first and are sorted in increasing order; + * complex roots come next and are sorted primarily by increasing + real part, secondarily by increasing imaginary part. + + Currently only rational coefficients are allowed. + Can be imported as ``CRootOf``. To avoid confusion, the + generator must be a Symbol. + + + Examples + ======== + + >>> from sympy import CRootOf, rootof + >>> from sympy.abc import x + + CRootOf is a way to reference a particular root of a + polynomial. If there is a rational root, it will be returned: + + >>> CRootOf.clear_cache() # for doctest reproducibility + >>> CRootOf(x**2 - 4, 0) + -2 + + Whether roots involving radicals are returned or not + depends on whether the ``radicals`` flag is true (which is + set to True with rootof): + + >>> CRootOf(x**2 - 3, 0) + CRootOf(x**2 - 3, 0) + >>> CRootOf(x**2 - 3, 0, radicals=True) + -sqrt(3) + >>> rootof(x**2 - 3, 0) + -sqrt(3) + + The following cannot be expressed in terms of radicals: + + >>> r = rootof(4*x**5 + 16*x**3 + 12*x**2 + 7, 0); r + CRootOf(4*x**5 + 16*x**3 + 12*x**2 + 7, 0) + + The root bounds can be seen, however, and they are used by the + evaluation methods to get numerical approximations for the root. + + >>> interval = r._get_interval(); interval + (-1, 0) + >>> r.evalf(2) + -0.98 + + The evalf method refines the width of the root bounds until it + guarantees that any decimal approximation within those bounds + will satisfy the desired precision. It then stores the refined + interval so subsequent requests at or below the requested + precision will not have to recompute the root bounds and will + return very quickly. + + Before evaluation above, the interval was + + >>> interval + (-1, 0) + + After evaluation it is now + + >>> r._get_interval() # doctest: +SKIP + (-165/169, -206/211) + + To reset all intervals for a given polynomial, the :meth:`_reset` method + can be called from any CRootOf instance of the polynomial: + + >>> r._reset() + >>> r._get_interval() + (-1, 0) + + The :meth:`eval_approx` method will also find the root to a given + precision but the interval is not modified unless the search + for the root fails to converge within the root bounds. And + the secant method is used to find the root. (The ``evalf`` + method uses bisection and will always update the interval.) + + >>> r.eval_approx(2) + -0.98 + + The interval needed to be slightly updated to find that root: + + >>> r._get_interval() + (-1, -1/2) + + The ``evalf_rational`` will compute a rational approximation + of the root to the desired accuracy or precision. + + >>> r.eval_rational(n=2) + -69629/71318 + + >>> t = CRootOf(x**3 + 10*x + 1, 1) + >>> t.eval_rational(1e-1) + 15/256 - 805*I/256 + >>> t.eval_rational(1e-1, 1e-4) + 3275/65536 - 414645*I/131072 + >>> t.eval_rational(1e-4, 1e-4) + 6545/131072 - 414645*I/131072 + >>> t.eval_rational(n=2) + 104755/2097152 - 6634255*I/2097152 + + Notes + ===== + + Although a PurePoly can be constructed from a non-symbol generator + RootOf instances of non-symbols are disallowed to avoid confusion + over what root is being represented. + + >>> from sympy import exp, PurePoly + >>> PurePoly(x) == PurePoly(exp(x)) + True + >>> CRootOf(x - 1, 0) + 1 + >>> CRootOf(exp(x) - 1, 0) # would correspond to x == 0 + Traceback (most recent call last): + ... + sympy.polys.polyerrors.PolynomialError: generator must be a Symbol + + See Also + ======== + + eval_approx + eval_rational + + """ + + __slots__ = ('index',) + is_complex = True + is_number = True + is_finite = True + is_algebraic = True + + def __new__(cls, f, x, index=None, radicals=False, expand=True): + """ Construct an indexed complex root of a polynomial. + + See ``rootof`` for the parameters. + + The default value of ``radicals`` is ``False`` to satisfy + ``eval(srepr(expr) == expr``. + """ + x = sympify(x) + + if index is None and x.is_Integer: + x, index = None, x + else: + index = sympify(index) + + if index is not None and index.is_Integer: + index = int(index) + else: + raise ValueError("expected an integer root index, got %s" % index) + + poly = PurePoly(f, x, greedy=False, expand=expand) + + if not poly.is_univariate: + raise PolynomialError("only univariate polynomials are allowed") + + if not poly.gen.is_Symbol: + # PurePoly(sin(x) + 1) == PurePoly(x + 1) but the roots of + # x for each are not the same: issue 8617 + raise PolynomialError("generator must be a Symbol") + + degree = poly.degree() + + if degree <= 0: + raise PolynomialError("Cannot construct CRootOf object for %s" % f) + + if index < -degree or index >= degree: + raise IndexError("root index out of [%d, %d] range, got %d" % + (-degree, degree - 1, index)) + elif index < 0: + index += degree + + dom = poly.get_domain() + + if not dom.is_Exact: + poly = poly.to_exact() + + roots = cls._roots_trivial(poly, radicals) + + if roots is not None: + return roots[index] + + coeff, poly = preprocess_roots(poly) + dom = poly.get_domain() + + if not dom.is_ZZ: + raise NotImplementedError("CRootOf is not supported over %s" % dom) + + root = cls._indexed_root(poly, index, lazy=True) + return coeff * cls._postprocess_root(root, radicals) + + @classmethod + def _new(cls, poly, index): + """Construct new ``CRootOf`` object from raw data. """ + obj = Expr.__new__(cls) + + obj.poly = PurePoly(poly) + obj.index = index + + try: + _reals_cache[obj.poly] = _reals_cache[poly] + _complexes_cache[obj.poly] = _complexes_cache[poly] + except KeyError: + pass + + return obj + + def _hashable_content(self): + return (self.poly, self.index) + + @property + def expr(self): + return self.poly.as_expr() + + @property + def args(self): + return (self.expr, Integer(self.index)) + + @property + def free_symbols(self): + # CRootOf currently only works with univariate expressions + # whose poly attribute should be a PurePoly with no free + # symbols + return set() + + def _eval_is_real(self): + """Return ``True`` if the root is real. """ + self._ensure_reals_init() + return self.index < len(_reals_cache[self.poly]) + + def _eval_is_imaginary(self): + """Return ``True`` if the root is imaginary. """ + self._ensure_reals_init() + if self.index >= len(_reals_cache[self.poly]): + ivl = self._get_interval() + return ivl.ax*ivl.bx <= 0 # all others are on one side or the other + return False # XXX is this necessary? + + @classmethod + def real_roots(cls, poly, radicals=True): + """Get real roots of a polynomial. """ + return cls._get_roots("_real_roots", poly, radicals) + + @classmethod + def all_roots(cls, poly, radicals=True): + """Get real and complex roots of a polynomial. """ + return cls._get_roots("_all_roots", poly, radicals) + + @classmethod + def _get_reals_sqf(cls, currentfactor, use_cache=True): + """Get real root isolating intervals for a square-free factor.""" + if use_cache and currentfactor in _reals_cache: + real_part = _reals_cache[currentfactor] + else: + _reals_cache[currentfactor] = real_part = \ + dup_isolate_real_roots_sqf( + currentfactor.rep.to_list(), currentfactor.rep.dom, blackbox=True) + + return real_part + + @classmethod + def _get_complexes_sqf(cls, currentfactor, use_cache=True): + """Get complex root isolating intervals for a square-free factor.""" + if use_cache and currentfactor in _complexes_cache: + complex_part = _complexes_cache[currentfactor] + else: + _complexes_cache[currentfactor] = complex_part = \ + dup_isolate_complex_roots_sqf( + currentfactor.rep.to_list(), currentfactor.rep.dom, blackbox=True) + return complex_part + + @classmethod + def _get_reals(cls, factors, use_cache=True): + """Compute real root isolating intervals for a list of factors. """ + reals = [] + + for currentfactor, k in factors: + try: + if not use_cache: + raise KeyError + r = _reals_cache[currentfactor] + reals.extend([(i, currentfactor, k) for i in r]) + except KeyError: + real_part = cls._get_reals_sqf(currentfactor, use_cache) + new = [(root, currentfactor, k) for root in real_part] + reals.extend(new) + + reals = cls._reals_sorted(reals) + return reals + + @classmethod + def _get_complexes(cls, factors, use_cache=True): + """Compute complex root isolating intervals for a list of factors. """ + complexes = [] + + for currentfactor, k in ordered(factors): + try: + if not use_cache: + raise KeyError + c = _complexes_cache[currentfactor] + complexes.extend([(i, currentfactor, k) for i in c]) + except KeyError: + complex_part = cls._get_complexes_sqf(currentfactor, use_cache) + new = [(root, currentfactor, k) for root in complex_part] + complexes.extend(new) + + complexes = cls._complexes_sorted(complexes) + return complexes + + @classmethod + def _reals_sorted(cls, reals): + """Make real isolating intervals disjoint and sort roots. """ + cache = {} + + for i, (u, f, k) in enumerate(reals): + for j, (v, g, m) in enumerate(reals[i + 1:]): + u, v = u.refine_disjoint(v) + reals[i + j + 1] = (v, g, m) + + reals[i] = (u, f, k) + + reals = sorted(reals, key=lambda r: r[0].a) + + for root, currentfactor, _ in reals: + if currentfactor in cache: + cache[currentfactor].append(root) + else: + cache[currentfactor] = [root] + + for currentfactor, root in cache.items(): + _reals_cache[currentfactor] = root + + return reals + + @classmethod + def _refine_imaginary(cls, complexes): + sifted = sift(complexes, lambda c: c[1]) + complexes = [] + for f in ordered(sifted): + nimag = _imag_count_of_factor(f) + if nimag == 0: + # refine until xbounds are neg or pos + for u, f, k in sifted[f]: + while u.ax*u.bx <= 0: + u = u._inner_refine() + complexes.append((u, f, k)) + else: + # refine until all but nimag xbounds are neg or pos + potential_imag = list(range(len(sifted[f]))) + while True: + assert len(potential_imag) > 1 + for i in list(potential_imag): + u, f, k = sifted[f][i] + if u.ax*u.bx > 0: + potential_imag.remove(i) + elif u.ax != u.bx: + u = u._inner_refine() + sifted[f][i] = u, f, k + if len(potential_imag) == nimag: + break + complexes.extend(sifted[f]) + return complexes + + @classmethod + def _refine_complexes(cls, complexes): + """return complexes such that no bounding rectangles of non-conjugate + roots would intersect. In addition, assure that neither ay nor by is + 0 to guarantee that non-real roots are distinct from real roots in + terms of the y-bounds. + """ + # get the intervals pairwise-disjoint. + # If rectangles were drawn around the coordinates of the bounding + # rectangles, no rectangles would intersect after this procedure. + for i, (u, f, k) in enumerate(complexes): + for j, (v, g, m) in enumerate(complexes[i + 1:]): + u, v = u.refine_disjoint(v) + complexes[i + j + 1] = (v, g, m) + + complexes[i] = (u, f, k) + + # refine until the x-bounds are unambiguously positive or negative + # for non-imaginary roots + complexes = cls._refine_imaginary(complexes) + + # make sure that all y bounds are off the real axis + # and on the same side of the axis + for i, (u, f, k) in enumerate(complexes): + while u.ay*u.by <= 0: + u = u.refine() + complexes[i] = u, f, k + return complexes + + @classmethod + def _complexes_sorted(cls, complexes): + """Make complex isolating intervals disjoint and sort roots. """ + complexes = cls._refine_complexes(complexes) + # XXX don't sort until you are sure that it is compatible + # with the indexing method but assert that the desired state + # is not broken + C, F = 0, 1 # location of ComplexInterval and factor + fs = {i[F] for i in complexes} + for i in range(1, len(complexes)): + if complexes[i][F] != complexes[i - 1][F]: + # if this fails the factors of a root were not + # contiguous because a discontinuity should only + # happen once + fs.remove(complexes[i - 1][F]) + for i, cmplx in enumerate(complexes): + # negative im part (conj=True) comes before + # positive im part (conj=False) + assert cmplx[C].conj is (i % 2 == 0) + + # update cache + cache = {} + # -- collate + for root, currentfactor, _ in complexes: + cache.setdefault(currentfactor, []).append(root) + # -- store + for currentfactor, root in cache.items(): + _complexes_cache[currentfactor] = root + + return complexes + + @classmethod + def _reals_index(cls, reals, index): + """ + Map initial real root index to an index in a factor where + the root belongs. + """ + i = 0 + + for j, (_, currentfactor, k) in enumerate(reals): + if index < i + k: + poly, index = currentfactor, 0 + + for _, currentfactor, _ in reals[:j]: + if currentfactor == poly: + index += 1 + + return poly, index + else: + i += k + + @classmethod + def _complexes_index(cls, complexes, index): + """ + Map initial complex root index to an index in a factor where + the root belongs. + """ + i = 0 + for j, (_, currentfactor, k) in enumerate(complexes): + if index < i + k: + poly, index = currentfactor, 0 + + for _, currentfactor, _ in complexes[:j]: + if currentfactor == poly: + index += 1 + + index += len(_reals_cache[poly]) + + return poly, index + else: + i += k + + @classmethod + def _count_roots(cls, roots): + """Count the number of real or complex roots with multiplicities.""" + return sum(k for _, _, k in roots) + + @classmethod + def _indexed_root(cls, poly, index, lazy=False): + """Get a root of a composite polynomial by index. """ + factors = _pure_factors(poly) + + # If the given poly is already irreducible, then the index does not + # need to be adjusted, and we can postpone the heavy lifting of + # computing and refining isolating intervals until that is needed. + # Note, however, that `_pure_factors()` extracts a negative leading + # coeff if present, so `factors[0][0]` may differ from `poly`, and + # is the "normalized" version of `poly` that we must return. + if lazy and len(factors) == 1 and factors[0][1] == 1: + return factors[0][0], index + + reals = cls._get_reals(factors) + reals_count = cls._count_roots(reals) + + if index < reals_count: + return cls._reals_index(reals, index) + else: + complexes = cls._get_complexes(factors) + return cls._complexes_index(complexes, index - reals_count) + + def _ensure_reals_init(self): + """Ensure that our poly has entries in the reals cache. """ + if self.poly not in _reals_cache: + self._indexed_root(self.poly, self.index) + + def _ensure_complexes_init(self): + """Ensure that our poly has entries in the complexes cache. """ + if self.poly not in _complexes_cache: + self._indexed_root(self.poly, self.index) + + @classmethod + def _real_roots(cls, poly): + """Get real roots of a composite polynomial. """ + factors = _pure_factors(poly) + + reals = cls._get_reals(factors) + reals_count = cls._count_roots(reals) + + roots = [] + + for index in range(0, reals_count): + roots.append(cls._reals_index(reals, index)) + + return roots + + def _reset(self): + """ + Reset all intervals + """ + self._all_roots(self.poly, use_cache=False) + + @classmethod + def _all_roots(cls, poly, use_cache=True): + """Get real and complex roots of a composite polynomial. """ + factors = _pure_factors(poly) + + reals = cls._get_reals(factors, use_cache=use_cache) + reals_count = cls._count_roots(reals) + + roots = [] + + for index in range(0, reals_count): + roots.append(cls._reals_index(reals, index)) + + complexes = cls._get_complexes(factors, use_cache=use_cache) + complexes_count = cls._count_roots(complexes) + + for index in range(0, complexes_count): + roots.append(cls._complexes_index(complexes, index)) + + return roots + + @classmethod + @cacheit + def _roots_trivial(cls, poly, radicals): + """Compute roots in linear, quadratic and binomial cases. """ + if poly.degree() == 1: + return roots_linear(poly) + + if not radicals: + return None + + if poly.degree() == 2: + return roots_quadratic(poly) + elif poly.length() == 2 and poly.TC(): + return roots_binomial(poly) + else: + return None + + @classmethod + def _preprocess_roots(cls, poly): + """Take heroic measures to make ``poly`` compatible with ``CRootOf``.""" + dom = poly.get_domain() + + if not dom.is_Exact: + poly = poly.to_exact() + + coeff, poly = preprocess_roots(poly) + dom = poly.get_domain() + + if not dom.is_ZZ: + raise NotImplementedError( + "sorted roots not supported over %s" % dom) + + return coeff, poly + + @classmethod + def _postprocess_root(cls, root, radicals): + """Return the root if it is trivial or a ``CRootOf`` object. """ + poly, index = root + roots = cls._roots_trivial(poly, radicals) + + if roots is not None: + return roots[index] + else: + return cls._new(poly, index) + + @classmethod + def _get_roots(cls, method, poly, radicals): + """Return postprocessed roots of specified kind. """ + if not poly.is_univariate: + raise PolynomialError("only univariate polynomials are allowed") + + dom = poly.get_domain() + + # get rid of gen and it's free symbol + d = Dummy() + poly = poly.subs(poly.gen, d) + x = symbols('x') + # see what others are left and select x or a numbered x + # that doesn't clash + free_names = {str(i) for i in poly.free_symbols} + for x in chain((symbols('x'),), numbered_symbols('x')): + if x.name not in free_names: + poly = poly.replace(d, x) + break + + if dom.is_QQ or dom.is_ZZ: + return cls._get_roots_qq(method, poly, radicals) + elif dom.is_AlgebraicField or dom.is_ZZ_I or dom.is_QQ_I: + return cls._get_roots_alg(method, poly, radicals) + else: + # XXX: not sure how to handle ZZ[x] which appears in some tests? + # this makes the tests pass alright but has to be a better way? + return cls._get_roots_qq(method, poly, radicals) + + + @classmethod + def _get_roots_qq(cls, method, poly, radicals): + """Return postprocessed roots of specified kind + for polynomials with rational coefficients. """ + coeff, poly = cls._preprocess_roots(poly) + roots = [] + + for root in getattr(cls, method)(poly): + roots.append(coeff*cls._postprocess_root(root, radicals)) + + return roots + + @classmethod + def _get_roots_alg(cls, method, poly, radicals): + """Return postprocessed roots of specified kind + for polynomials with algebraic coefficients. It assumes + the domain is already an algebraic field. First it + finds the roots using _get_roots_qq, then uses the + square-free factors to filter roots and get the correct + multiplicity. + """ + + # Existing QQ code can find and sort the roots + roots = cls._get_roots_qq(method, poly.lift(), radicals) + + subroots = {} + for f, m in poly.sqf_list()[1]: + if method == "_real_roots": + roots_filt = f.which_real_roots(roots) + elif method == "_all_roots": + roots_filt = f.which_all_roots(roots) + for r in roots_filt: + subroots[r] = m + + roots_seen = set() + roots_flat = [] + for r in roots: + if r in subroots and r not in roots_seen: + m = subroots[r] + roots_flat.extend([r] * m) + roots_seen.add(r) + + return roots_flat + + @classmethod + def clear_cache(cls): + """Reset cache for reals and complexes. + + The intervals used to approximate a root instance are updated + as needed. When a request is made to see the intervals, the + most current values are shown. `clear_cache` will reset all + CRootOf instances back to their original state. + + See Also + ======== + + _reset + """ + global _reals_cache, _complexes_cache + _reals_cache = _pure_key_dict() + _complexes_cache = _pure_key_dict() + + def _get_interval(self): + """Internal function for retrieving isolation interval from cache. """ + self._ensure_reals_init() + if self.is_real: + return _reals_cache[self.poly][self.index] + else: + reals_count = len(_reals_cache[self.poly]) + self._ensure_complexes_init() + return _complexes_cache[self.poly][self.index - reals_count] + + def _set_interval(self, interval): + """Internal function for updating isolation interval in cache. """ + self._ensure_reals_init() + if self.is_real: + _reals_cache[self.poly][self.index] = interval + else: + reals_count = len(_reals_cache[self.poly]) + self._ensure_complexes_init() + _complexes_cache[self.poly][self.index - reals_count] = interval + + def _eval_subs(self, old, new): + # don't allow subs to change anything + return self + + def _eval_conjugate(self): + if self.is_real: + return self + expr, i = self.args + return self.func(expr, i + (1 if self._get_interval().conj else -1)) + + def eval_approx(self, n, return_mpmath=False): + """Evaluate this complex root to the given precision. + + This uses secant method and root bounds are used to both + generate an initial guess and to check that the root + returned is valid. If ever the method converges outside the + root bounds, the bounds will be made smaller and updated. + """ + prec = dps_to_prec(n) + with workprec(prec): + g = self.poly.gen + if not g.is_Symbol: + d = Dummy('x') + if self.is_imaginary: + d *= I + func = lambdify(d, self.expr.subs(g, d)) + else: + expr = self.expr + if self.is_imaginary: + expr = self.expr.subs(g, I*g) + func = lambdify(g, expr) + + interval = self._get_interval() + while True: + if self.is_real: + a = mpf(str(interval.a)) + b = mpf(str(interval.b)) + if a == b: + root = a + break + x0 = mpf(str(interval.center)) + x1 = x0 + mpf(str(interval.dx))/4 + elif self.is_imaginary: + a = mpf(str(interval.ay)) + b = mpf(str(interval.by)) + if a == b: + root = mpc(mpf('0'), a) + break + x0 = mpf(str(interval.center[1])) + x1 = x0 + mpf(str(interval.dy))/4 + else: + ax = mpf(str(interval.ax)) + bx = mpf(str(interval.bx)) + ay = mpf(str(interval.ay)) + by = mpf(str(interval.by)) + if ax == bx and ay == by: + root = mpc(ax, ay) + break + x0 = mpc(*map(str, interval.center)) + x1 = x0 + mpc(*map(str, (interval.dx, interval.dy)))/4 + try: + # without a tolerance, this will return when (to within + # the given precision) x_i == x_{i-1} + root = findroot(func, (x0, x1)) + # If the (real or complex) root is not in the 'interval', + # then keep refining the interval. This happens if findroot + # accidentally finds a different root outside of this + # interval because our initial estimate 'x0' was not close + # enough. It is also possible that the secant method will + # get trapped by a max/min in the interval; the root + # verification by findroot will raise a ValueError in this + # case and the interval will then be tightened -- and + # eventually the root will be found. + # + # It is also possible that findroot will not have any + # successful iterations to process (in which case it + # will fail to initialize a variable that is tested + # after the iterations and raise an UnboundLocalError). + if self.is_real or self.is_imaginary: + if not bool(root.imag) == self.is_real and ( + a <= root <= b): + if self.is_imaginary: + root = mpc(mpf('0'), root.real) + break + elif (ax <= root.real <= bx and ay <= root.imag <= by): + break + except (UnboundLocalError, ValueError): + pass + interval = interval.refine() + + # update the interval so we at least (for this precision or + # less) don't have much work to do to recompute the root + self._set_interval(interval) + if return_mpmath: + return root + return (Float._new(root.real._mpf_, prec) + + I*Float._new(root.imag._mpf_, prec)) + + def _eval_evalf(self, prec, **kwargs): + """Evaluate this complex root to the given precision.""" + # all kwargs are ignored + return self.eval_rational(n=prec_to_dps(prec))._evalf(prec) + + def eval_rational(self, dx=None, dy=None, n=15): + """ + Return a Rational approximation of ``self`` that has real + and imaginary component approximations that are within ``dx`` + and ``dy`` of the true values, respectively. Alternatively, + ``n`` digits of precision can be specified. + + The interval is refined with bisection and is sure to + converge. The root bounds are updated when the refinement + is complete so recalculation at the same or lesser precision + will not have to repeat the refinement and should be much + faster. + + The following example first obtains Rational approximation to + 1e-8 accuracy for all roots of the 4-th order Legendre + polynomial. Since the roots are all less than 1, this will + ensure the decimal representation of the approximation will be + correct (including rounding) to 6 digits: + + >>> from sympy import legendre_poly, Symbol + >>> x = Symbol("x") + >>> p = legendre_poly(4, x, polys=True) + >>> r = p.real_roots()[-1] + >>> r.eval_rational(10**-8).n(6) + 0.861136 + + It is not necessary to a two-step calculation, however: the + decimal representation can be computed directly: + + >>> r.evalf(17) + 0.86113631159405258 + + """ + dy = dy or dx + if dx: + rtol = None + dx = dx if isinstance(dx, Rational) else Rational(str(dx)) + dy = dy if isinstance(dy, Rational) else Rational(str(dy)) + else: + # 5 binary (or 2 decimal) digits are needed to ensure that + # a given digit is correctly rounded + # prec_to_dps(dps_to_prec(n) + 5) - n <= 2 (tested for + # n in range(1000000) + rtol = S(10)**-(n + 2) # +2 for guard digits + interval = self._get_interval() + while True: + if self.is_real: + if rtol: + dx = abs(interval.center*rtol) + interval = interval.refine_size(dx=dx) + c = interval.center + real = Rational(c) + imag = S.Zero + if not rtol or interval.dx < abs(c*rtol): + break + elif self.is_imaginary: + if rtol: + dy = abs(interval.center[1]*rtol) + dx = 1 + interval = interval.refine_size(dx=dx, dy=dy) + c = interval.center[1] + imag = Rational(c) + real = S.Zero + if not rtol or interval.dy < abs(c*rtol): + break + else: + if rtol: + dx = abs(interval.center[0]*rtol) + dy = abs(interval.center[1]*rtol) + interval = interval.refine_size(dx, dy) + c = interval.center + real, imag = map(Rational, c) + if not rtol or ( + interval.dx < abs(c[0]*rtol) and + interval.dy < abs(c[1]*rtol)): + break + + # update the interval so we at least (for this precision or + # less) don't have much work to do to recompute the root + self._set_interval(interval) + return real + I*imag + + +CRootOf = ComplexRootOf + + +@dispatch(ComplexRootOf, ComplexRootOf) +def _eval_is_eq(lhs, rhs): # noqa:F811 + # if we use is_eq to check here, we get infinite recursion + return lhs == rhs + + +@dispatch(ComplexRootOf, Basic) # type:ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + # CRootOf represents a Root, so if rhs is that root, it should set + # the expression to zero *and* it should be in the interval of the + # CRootOf instance. It must also be a number that agrees with the + # is_real value of the CRootOf instance. + if not rhs.is_number: + return None + if not rhs.is_finite: + return False + z = lhs.expr.subs(lhs.expr.free_symbols.pop(), rhs).is_zero + if z is False: # all roots will make z True but we don't know + # whether this is the right root if z is True + return False + o = rhs.is_real, rhs.is_imaginary + s = lhs.is_real, lhs.is_imaginary + assert None not in s # this is part of initial refinement + if o != s and None not in o: + return False + re, im = rhs.as_real_imag() + if lhs.is_real: + if im: + return False + i = lhs._get_interval() + a, b = [Rational(str(_)) for _ in (i.a, i.b)] + return sympify(a <= rhs and rhs <= b) + i = lhs._get_interval() + r1, r2, i1, i2 = [Rational(str(j)) for j in ( + i.ax, i.bx, i.ay, i.by)] + return is_le(r1, re) and is_le(re,r2) and is_le(i1,im) and is_le(im,i2) + + +@public +class RootSum(Expr): + """Represents a sum of all roots of a univariate polynomial. """ + + __slots__ = ('poly', 'fun', 'auto') + + def __new__(cls, expr, func=None, x=None, auto=True, quadratic=False): + """Construct a new ``RootSum`` instance of roots of a polynomial.""" + coeff, poly = cls._transform(expr, x) + + if not poly.is_univariate: + raise MultivariatePolynomialError( + "only univariate polynomials are allowed") + + if func is None: + func = Lambda(poly.gen, poly.gen) + else: + is_func = getattr(func, 'is_Function', False) + + if is_func and 1 in func.nargs: + if not isinstance(func, Lambda): + func = Lambda(poly.gen, func(poly.gen)) + else: + raise ValueError( + "expected a univariate function, got %s" % func) + + var, expr = func.variables[0], func.expr + + if coeff is not S.One: + expr = expr.subs(var, coeff*var) + + deg = poly.degree() + + if not expr.has(var): + return deg*expr + + if expr.is_Add: + add_const, expr = expr.as_independent(var) + else: + add_const = S.Zero + + if expr.is_Mul: + mul_const, expr = expr.as_independent(var) + else: + mul_const = S.One + + func = Lambda(var, expr) + + rational = cls._is_func_rational(poly, func) + factors, terms = _pure_factors(poly), [] + + for poly, k in factors: + if poly.is_linear: + term = func(roots_linear(poly)[0]) + elif quadratic and poly.is_quadratic: + term = sum(map(func, roots_quadratic(poly))) + else: + if not rational or not auto: + term = cls._new(poly, func, auto) + else: + term = cls._rational_case(poly, func) + + terms.append(k*term) + + return mul_const*Add(*terms) + deg*add_const + + @classmethod + def _new(cls, poly, func, auto=True): + """Construct new raw ``RootSum`` instance. """ + obj = Expr.__new__(cls) + + obj.poly = poly + obj.fun = func + obj.auto = auto + + return obj + + @classmethod + def new(cls, poly, func, auto=True): + """Construct new ``RootSum`` instance. """ + if not func.expr.has(*func.variables): + return func.expr + + rational = cls._is_func_rational(poly, func) + + if not rational or not auto: + return cls._new(poly, func, auto) + else: + return cls._rational_case(poly, func) + + @classmethod + def _transform(cls, expr, x): + """Transform an expression to a polynomial. """ + poly = PurePoly(expr, x, greedy=False) + return preprocess_roots(poly) + + @classmethod + def _is_func_rational(cls, poly, func): + """Check if a lambda is a rational function. """ + var, expr = func.variables[0], func.expr + return expr.is_rational_function(var) + + @classmethod + def _rational_case(cls, poly, func): + """Handle the rational function case. """ + roots = symbols('r:%d' % poly.degree()) + var, expr = func.variables[0], func.expr + + f = sum(expr.subs(var, r) for r in roots) + p, q = together(f).as_numer_denom() + + domain = QQ[roots] + + p = p.expand() + q = q.expand() + + try: + p = Poly(p, domain=domain, expand=False) + except GeneratorsNeeded: + p, p_coeff = None, (p,) + else: + p_monom, p_coeff = zip(*p.terms()) + + try: + q = Poly(q, domain=domain, expand=False) + except GeneratorsNeeded: + q, q_coeff = None, (q,) + else: + q_monom, q_coeff = zip(*q.terms()) + + coeffs, mapping = symmetrize(p_coeff + q_coeff, formal=True) + formulas, values = viete(poly, roots), [] + + for (sym, _), (_, val) in zip(mapping, formulas): + values.append((sym, val)) + + for i, (coeff, _) in enumerate(coeffs): + coeffs[i] = coeff.subs(values) + + n = len(p_coeff) + + p_coeff = coeffs[:n] + q_coeff = coeffs[n:] + + if p is not None: + p = Poly(dict(zip(p_monom, p_coeff)), *p.gens).as_expr() + else: + (p,) = p_coeff + + if q is not None: + q = Poly(dict(zip(q_monom, q_coeff)), *q.gens).as_expr() + else: + (q,) = q_coeff + + return factor(p/q) + + def _hashable_content(self): + return (self.poly, self.fun) + + @property + def expr(self): + return self.poly.as_expr() + + @property + def args(self): + return (self.expr, self.fun, self.poly.gen) + + @property + def free_symbols(self): + return self.poly.free_symbols | self.fun.free_symbols + + @property + def is_commutative(self): + return True + + def doit(self, **hints): + if not hints.get('roots', True): + return self + + _roots = roots(self.poly, multiple=True) + + if len(_roots) < self.poly.degree(): + return self + else: + return Add(*[self.fun(r) for r in _roots]) + + def _eval_evalf(self, prec): + try: + _roots = self.poly.nroots(n=prec_to_dps(prec)) + except (DomainError, PolynomialError): + return self + else: + return Add(*[self.fun(r) for r in _roots]) + + def _eval_derivative(self, x): + var, expr = self.fun.args + func = Lambda(var, expr.diff(x)) + return self.new(self.poly, func, self.auto) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/solvers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..b333e81d975a8cd71e7eb683c2b943d8538f6ac5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/solvers.py @@ -0,0 +1,435 @@ +"""Low-level linear systems solver. """ + + +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import connected_components + +from sympy.core.sympify import sympify +from sympy.core.numbers import Integer, Rational +from sympy.matrices.dense import MutableDenseMatrix +from sympy.polys.domains import ZZ, QQ + +from sympy.polys.domains import EX +from sympy.polys.rings import sring +from sympy.polys.polyerrors import NotInvertible +from sympy.polys.domainmatrix import DomainMatrix + + +class PolyNonlinearError(Exception): + """Raised by solve_lin_sys for nonlinear equations""" + pass + + +class RawMatrix(MutableDenseMatrix): + """ + .. deprecated:: 1.9 + + This class fundamentally is broken by design. Use ``DomainMatrix`` if + you want a matrix over the polys domains or ``Matrix`` for a matrix + with ``Expr`` elements. The ``RawMatrix`` class will be removed/broken + in future in order to reestablish the invariant that the elements of a + Matrix should be of type ``Expr``. + + """ + _sympify = staticmethod(lambda x, *args, **kwargs: x) + + def __init__(self, *args, **kwargs): + sympy_deprecation_warning( + """ + The RawMatrix class is deprecated. Use either DomainMatrix or + Matrix instead. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-rawmatrix", + ) + + domain = ZZ + for i in range(self.rows): + for j in range(self.cols): + val = self[i,j] + if getattr(val, 'is_Poly', False): + K = val.domain[val.gens] + val_sympy = val.as_expr() + elif hasattr(val, 'parent'): + K = val.parent() + val_sympy = K.to_sympy(val) + elif isinstance(val, (int, Integer)): + K = ZZ + val_sympy = sympify(val) + elif isinstance(val, Rational): + K = QQ + val_sympy = val + else: + for K in ZZ, QQ: + if K.of_type(val): + val_sympy = K.to_sympy(val) + break + else: + raise TypeError + domain = domain.unify(K) + self[i,j] = val_sympy + self.ring = domain + + +def eqs_to_matrix(eqs_coeffs, eqs_rhs, gens, domain): + """Get matrix from linear equations in dict format. + + Explanation + =========== + + Get the matrix representation of a system of linear equations represented + as dicts with low-level DomainElement coefficients. This is an + *internal* function that is used by solve_lin_sys. + + Parameters + ========== + + eqs_coeffs: list[dict[Symbol, DomainElement]] + The left hand sides of the equations as dicts mapping from symbols to + coefficients where the coefficients are instances of + DomainElement. + eqs_rhs: list[DomainElements] + The right hand sides of the equations as instances of + DomainElement. + gens: list[Symbol] + The unknowns in the system of equations. + domain: Domain + The domain for coefficients of both lhs and rhs. + + Returns + ======= + + The augmented matrix representation of the system as a DomainMatrix. + + Examples + ======== + + >>> from sympy import symbols, ZZ + >>> from sympy.polys.solvers import eqs_to_matrix + >>> x, y = symbols('x, y') + >>> eqs_coeff = [{x:ZZ(1), y:ZZ(1)}, {x:ZZ(1), y:ZZ(-1)}] + >>> eqs_rhs = [ZZ(0), ZZ(-1)] + >>> eqs_to_matrix(eqs_coeff, eqs_rhs, [x, y], ZZ) + DomainMatrix([[1, 1, 0], [1, -1, 1]], (2, 3), ZZ) + + See also + ======== + + solve_lin_sys: Uses :func:`~eqs_to_matrix` internally + """ + sym2index = {x: n for n, x in enumerate(gens)} + nrows = len(eqs_coeffs) + ncols = len(gens) + 1 + rows = [[domain.zero] * ncols for _ in range(nrows)] + for row, eq_coeff, eq_rhs in zip(rows, eqs_coeffs, eqs_rhs): + for sym, coeff in eq_coeff.items(): + row[sym2index[sym]] = domain.convert(coeff) + row[-1] = -domain.convert(eq_rhs) + + return DomainMatrix(rows, (nrows, ncols), domain) + + +def sympy_eqs_to_ring(eqs, symbols): + """Convert a system of equations from Expr to a PolyRing + + Explanation + =========== + + High-level functions like ``solve`` expect Expr as inputs but can use + ``solve_lin_sys`` internally. This function converts equations from + ``Expr`` to the low-level poly types used by the ``solve_lin_sys`` + function. + + Parameters + ========== + + eqs: List of Expr + A list of equations as Expr instances + symbols: List of Symbol + A list of the symbols that are the unknowns in the system of + equations. + + Returns + ======= + + Tuple[List[PolyElement], Ring]: The equations as PolyElement instances + and the ring of polynomials within which each equation is represented. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.polys.solvers import sympy_eqs_to_ring + >>> a, x, y = symbols('a, x, y') + >>> eqs = [x-y, x+a*y] + >>> eqs_ring, ring = sympy_eqs_to_ring(eqs, [x, y]) + >>> eqs_ring + [x - y, x + a*y] + >>> type(eqs_ring[0]) + + >>> ring + ZZ(a)[x,y] + + With the equations in this form they can be passed to ``solve_lin_sys``: + + >>> from sympy.polys.solvers import solve_lin_sys + >>> solve_lin_sys(eqs_ring, ring) + {y: 0, x: 0} + """ + try: + K, eqs_K = sring(eqs, symbols, field=True, extension=True) + except NotInvertible: + # https://github.com/sympy/sympy/issues/18874 + K, eqs_K = sring(eqs, symbols, domain=EX) + return eqs_K, K.to_domain() + + +def solve_lin_sys(eqs, ring, _raw=True): + """Solve a system of linear equations from a PolynomialRing + + Explanation + =========== + + Solves a system of linear equations given as PolyElement instances of a + PolynomialRing. The basic arithmetic is carried out using instance of + DomainElement which is more efficient than :class:`~sympy.core.expr.Expr` + for the most common inputs. + + While this is a public function it is intended primarily for internal use + so its interface is not necessarily convenient. Users are suggested to use + the :func:`sympy.solvers.solveset.linsolve` function (which uses this + function internally) instead. + + Parameters + ========== + + eqs: list[PolyElement] + The linear equations to be solved as elements of a + PolynomialRing (assumed equal to zero). + ring: PolynomialRing + The polynomial ring from which eqs are drawn. The generators of this + ring are the unknowns to be solved for and the domain of the ring is + the domain of the coefficients of the system of equations. + _raw: bool + If *_raw* is False, the keys and values in the returned dictionary + will be of type Expr (and the unit of the field will be removed from + the keys) otherwise the low-level polys types will be returned, e.g. + PolyElement: PythonRational. + + Returns + ======= + + ``None`` if the system has no solution. + + dict[Symbol, Expr] if _raw=False + + dict[Symbol, DomainElement] if _raw=True. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.polys.solvers import solve_lin_sys, sympy_eqs_to_ring + >>> x, y = symbols('x, y') + >>> eqs = [x - y, x + y - 2] + >>> eqs_ring, ring = sympy_eqs_to_ring(eqs, [x, y]) + >>> solve_lin_sys(eqs_ring, ring) + {y: 1, x: 1} + + Passing ``_raw=False`` returns the same result except that the keys are + ``Expr`` rather than low-level poly types. + + >>> solve_lin_sys(eqs_ring, ring, _raw=False) + {x: 1, y: 1} + + See also + ======== + + sympy_eqs_to_ring: prepares the inputs to ``solve_lin_sys``. + linsolve: ``linsolve`` uses ``solve_lin_sys`` internally. + sympy.solvers.solvers.solve: ``solve`` uses ``solve_lin_sys`` internally. + """ + as_expr = not _raw + + assert ring.domain.is_Field + + eqs_dict = [dict(eq) for eq in eqs] + + one_monom = ring.one.monoms()[0] + zero = ring.domain.zero + + eqs_rhs = [] + eqs_coeffs = [] + for eq_dict in eqs_dict: + eq_rhs = eq_dict.pop(one_monom, zero) + eq_coeffs = {} + for monom, coeff in eq_dict.items(): + if sum(monom) != 1: + msg = "Nonlinear term encountered in solve_lin_sys" + raise PolyNonlinearError(msg) + eq_coeffs[ring.gens[monom.index(1)]] = coeff + if not eq_coeffs: + if not eq_rhs: + continue + else: + return None + eqs_rhs.append(eq_rhs) + eqs_coeffs.append(eq_coeffs) + + result = _solve_lin_sys(eqs_coeffs, eqs_rhs, ring) + + if result is not None and as_expr: + + def to_sympy(x): + as_expr = getattr(x, 'as_expr', None) + if as_expr: + return as_expr() + else: + return ring.domain.to_sympy(x) + + tresult = {to_sympy(sym): to_sympy(val) for sym, val in result.items()} + + # Remove 1.0x + result = {} + for k, v in tresult.items(): + if k.is_Mul: + c, s = k.as_coeff_Mul() + result[s] = v/c + else: + result[k] = v + + return result + + +def _solve_lin_sys(eqs_coeffs, eqs_rhs, ring): + """Solve a linear system from dict of PolynomialRing coefficients + + Explanation + =========== + + This is an **internal** function used by :func:`solve_lin_sys` after the + equations have been preprocessed. The role of this function is to split + the system into connected components and pass those to + :func:`_solve_lin_sys_component`. + + Examples + ======== + + Setup a system for $x-y=0$ and $x+y=2$ and solve: + + >>> from sympy import symbols, sring + >>> from sympy.polys.solvers import _solve_lin_sys + >>> x, y = symbols('x, y') + >>> R, (xr, yr) = sring([x, y], [x, y]) + >>> eqs = [{xr:R.one, yr:-R.one}, {xr:R.one, yr:R.one}] + >>> eqs_rhs = [R.zero, -2*R.one] + >>> _solve_lin_sys(eqs, eqs_rhs, R) + {y: 1, x: 1} + + See also + ======== + + solve_lin_sys: This function is used internally by :func:`solve_lin_sys`. + """ + V = ring.gens + E = [] + for eq_coeffs in eqs_coeffs: + syms = list(eq_coeffs) + E.extend(zip(syms[:-1], syms[1:])) + G = V, E + + components = connected_components(G) + + sym2comp = {} + for n, component in enumerate(components): + for sym in component: + sym2comp[sym] = n + + subsystems = [([], []) for _ in range(len(components))] + for eq_coeff, eq_rhs in zip(eqs_coeffs, eqs_rhs): + sym = next(iter(eq_coeff), None) + sub_coeff, sub_rhs = subsystems[sym2comp[sym]] + sub_coeff.append(eq_coeff) + sub_rhs.append(eq_rhs) + + sol = {} + for subsystem in subsystems: + subsol = _solve_lin_sys_component(subsystem[0], subsystem[1], ring) + if subsol is None: + return None + sol.update(subsol) + + return sol + + +def _solve_lin_sys_component(eqs_coeffs, eqs_rhs, ring): + """Solve a linear system from dict of PolynomialRing coefficients + + Explanation + =========== + + This is an **internal** function used by :func:`solve_lin_sys` after the + equations have been preprocessed. After :func:`_solve_lin_sys` splits the + system into connected components this function is called for each + component. The system of equations is solved using Gauss-Jordan + elimination with division followed by back-substitution. + + Examples + ======== + + Setup a system for $x-y=0$ and $x+y=2$ and solve: + + >>> from sympy import symbols, sring + >>> from sympy.polys.solvers import _solve_lin_sys_component + >>> x, y = symbols('x, y') + >>> R, (xr, yr) = sring([x, y], [x, y]) + >>> eqs = [{xr:R.one, yr:-R.one}, {xr:R.one, yr:R.one}] + >>> eqs_rhs = [R.zero, -2*R.one] + >>> _solve_lin_sys_component(eqs, eqs_rhs, R) + {y: 1, x: 1} + + See also + ======== + + solve_lin_sys: This function is used internally by :func:`solve_lin_sys`. + """ + + # transform from equations to matrix form + matrix = eqs_to_matrix(eqs_coeffs, eqs_rhs, ring.gens, ring.domain) + + # convert to a field for rref + if not matrix.domain.is_Field: + matrix = matrix.to_field() + + # solve by row-reduction + echelon, pivots = matrix.rref() + + # construct the returnable form of the solutions + keys = ring.gens + + if pivots and pivots[-1] == len(keys): + return None + + if len(pivots) == len(keys): + sol = [] + for s in [row[-1] for row in echelon.rep.to_ddm()]: + a = s + sol.append(a) + sols = dict(zip(keys, sol)) + else: + sols = {} + g = ring.gens + # Extract ground domain coefficients and convert to the ring: + if hasattr(ring, 'ring'): + convert = ring.ring.ground_new + else: + convert = ring.ground_new + echelon = echelon.rep.to_ddm() + vals_set = {v for row in echelon for v in row} + vals_map = {v: convert(v) for v in vals_set} + echelon = [[vals_map[eij] for eij in ei] for ei in echelon] + for i, p in enumerate(pivots): + v = echelon[i][-1] - sum(echelon[i][j]*g[j] for j in range(p+1, len(g)) if echelon[i][j]) + sols[keys[p]] = v + + return sols diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/specialpolys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/specialpolys.py new file mode 100644 index 0000000000000000000000000000000000000000..3e85de8679cda3084f1c263a045f4d8f817bed98 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/specialpolys.py @@ -0,0 +1,340 @@ +"""Functions for generating interesting polynomials, e.g. for benchmarking. """ + + +from sympy.core import Add, Mul, Symbol, sympify, Dummy, symbols +from sympy.core.containers import Tuple +from sympy.core.singleton import S +from sympy.ntheory import nextprime +from sympy.polys.densearith import ( + dmp_add_term, dmp_neg, dmp_mul, dmp_sqr +) +from sympy.polys.densebasic import ( + dmp_zero, dmp_one, dmp_ground, + dup_from_raw_dict, dmp_raise, dup_random +) +from sympy.polys.domains import ZZ +from sympy.polys.factortools import dup_zz_cyclotomic_poly +from sympy.polys.polyclasses import DMP +from sympy.polys.polytools import Poly, PurePoly +from sympy.polys.polyutils import _analyze_gens +from sympy.utilities import subsets, public, filldedent + + +@public +def swinnerton_dyer_poly(n, x=None, polys=False): + """Generates n-th Swinnerton-Dyer polynomial in `x`. + + Parameters + ---------- + n : int + `n` decides the order of polynomial + x : optional + polys : bool, optional + ``polys=True`` returns an expression, otherwise + (default) returns an expression. + """ + if n <= 0: + raise ValueError( + "Cannot generate Swinnerton-Dyer polynomial of order %s" % n) + + if x is not None: + sympify(x) + else: + x = Dummy('x') + + if n > 3: + from sympy.functions.elementary.miscellaneous import sqrt + from .numberfields import minimal_polynomial + p = 2 + a = [sqrt(2)] + for i in range(2, n + 1): + p = nextprime(p) + a.append(sqrt(p)) + return minimal_polynomial(Add(*a), x, polys=polys) + + if n == 1: + ex = x**2 - 2 + elif n == 2: + ex = x**4 - 10*x**2 + 1 + elif n == 3: + ex = x**8 - 40*x**6 + 352*x**4 - 960*x**2 + 576 + + return PurePoly(ex, x) if polys else ex + + +@public +def cyclotomic_poly(n, x=None, polys=False): + """Generates cyclotomic polynomial of order `n` in `x`. + + Parameters + ---------- + n : int + `n` decides the order of polynomial + x : optional + polys : bool, optional + ``polys=True`` returns an expression, otherwise + (default) returns an expression. + """ + if n <= 0: + raise ValueError( + "Cannot generate cyclotomic polynomial of order %s" % n) + + poly = DMP(dup_zz_cyclotomic_poly(int(n), ZZ), ZZ) + + if x is not None: + poly = Poly.new(poly, x) + else: + poly = PurePoly.new(poly, Dummy('x')) + + return poly if polys else poly.as_expr() + + +@public +def symmetric_poly(n, *gens, polys=False): + """ + Generates symmetric polynomial of order `n`. + + Parameters + ========== + + polys: bool, optional (default: False) + Returns a Poly object when ``polys=True``, otherwise + (default) returns an expression. + """ + gens = _analyze_gens(gens) + + if n < 0 or n > len(gens) or not gens: + raise ValueError("Cannot generate symmetric polynomial of order %s for %s" % (n, gens)) + elif not n: + poly = S.One + else: + poly = Add(*[Mul(*s) for s in subsets(gens, int(n))]) + + return Poly(poly, *gens) if polys else poly + + +@public +def random_poly(x, n, inf, sup, domain=ZZ, polys=False): + """Generates a polynomial of degree ``n`` with coefficients in + ``[inf, sup]``. + + Parameters + ---------- + x + `x` is the independent term of polynomial + n : int + `n` decides the order of polynomial + inf + Lower limit of range in which coefficients lie + sup + Upper limit of range in which coefficients lie + domain : optional + Decides what ring the coefficients are supposed + to belong. Default is set to Integers. + polys : bool, optional + ``polys=True`` returns an expression, otherwise + (default) returns an expression. + """ + poly = Poly(dup_random(n, inf, sup, domain), x, domain=domain) + + return poly if polys else poly.as_expr() + + +@public +def interpolating_poly(n, x, X='x', Y='y'): + """Construct Lagrange interpolating polynomial for ``n`` + data points. If a sequence of values are given for ``X`` and ``Y`` + then the first ``n`` values will be used. + """ + ok = getattr(x, 'free_symbols', None) + + if isinstance(X, str): + X = symbols("%s:%s" % (X, n)) + elif ok and ok & Tuple(*X).free_symbols: + ok = False + + if isinstance(Y, str): + Y = symbols("%s:%s" % (Y, n)) + elif ok and ok & Tuple(*Y).free_symbols: + ok = False + + if not ok: + raise ValueError(filldedent(''' + Expecting symbol for x that does not appear in X or Y. + Use `interpolate(list(zip(X, Y)), x)` instead.''')) + + coeffs = [] + numert = Mul(*[x - X[i] for i in range(n)]) + + for i in range(n): + numer = numert/(x - X[i]) + denom = Mul(*[(X[i] - X[j]) for j in range(n) if i != j]) + coeffs.append(numer/denom) + + return Add(*[coeff*y for coeff, y in zip(coeffs, Y)]) + + +def fateman_poly_F_1(n): + """Fateman's GCD benchmark: trivial GCD """ + Y = [Symbol('y_' + str(i)) for i in range(n + 1)] + + y_0, y_1 = Y[0], Y[1] + + u = y_0 + Add(*Y[1:]) + v = y_0**2 + Add(*[y**2 for y in Y[1:]]) + + F = ((u + 1)*(u + 2)).as_poly(*Y) + G = ((v + 1)*(-3*y_1*y_0**2 + y_1**2 - 1)).as_poly(*Y) + + H = Poly(1, *Y) + + return F, G, H + + +def dmp_fateman_poly_F_1(n, K): + """Fateman's GCD benchmark: trivial GCD """ + u = [K(1), K(0)] + + for i in range(n): + u = [dmp_one(i, K), u] + + v = [K(1), K(0), K(0)] + + for i in range(0, n): + v = [dmp_one(i, K), dmp_zero(i), v] + + m = n - 1 + + U = dmp_add_term(u, dmp_ground(K(1), m), 0, n, K) + V = dmp_add_term(u, dmp_ground(K(2), m), 0, n, K) + + f = [[-K(3), K(0)], [], [K(1), K(0), -K(1)]] + + W = dmp_add_term(v, dmp_ground(K(1), m), 0, n, K) + Y = dmp_raise(f, m, 1, K) + + F = dmp_mul(U, V, n, K) + G = dmp_mul(W, Y, n, K) + + H = dmp_one(n, K) + + return F, G, H + + +def fateman_poly_F_2(n): + """Fateman's GCD benchmark: linearly dense quartic inputs """ + Y = [Symbol('y_' + str(i)) for i in range(n + 1)] + + y_0 = Y[0] + + u = Add(*Y[1:]) + + H = Poly((y_0 + u + 1)**2, *Y) + + F = Poly((y_0 - u - 2)**2, *Y) + G = Poly((y_0 + u + 2)**2, *Y) + + return H*F, H*G, H + + +def dmp_fateman_poly_F_2(n, K): + """Fateman's GCD benchmark: linearly dense quartic inputs """ + u = [K(1), K(0)] + + for i in range(n - 1): + u = [dmp_one(i, K), u] + + m = n - 1 + + v = dmp_add_term(u, dmp_ground(K(2), m - 1), 0, n, K) + + f = dmp_sqr([dmp_one(m, K), dmp_neg(v, m, K)], n, K) + g = dmp_sqr([dmp_one(m, K), v], n, K) + + v = dmp_add_term(u, dmp_one(m - 1, K), 0, n, K) + + h = dmp_sqr([dmp_one(m, K), v], n, K) + + return dmp_mul(f, h, n, K), dmp_mul(g, h, n, K), h + + +def fateman_poly_F_3(n): + """Fateman's GCD benchmark: sparse inputs (deg f ~ vars f) """ + Y = [Symbol('y_' + str(i)) for i in range(n + 1)] + + y_0 = Y[0] + + u = Add(*[y**(n + 1) for y in Y[1:]]) + + H = Poly((y_0**(n + 1) + u + 1)**2, *Y) + + F = Poly((y_0**(n + 1) - u - 2)**2, *Y) + G = Poly((y_0**(n + 1) + u + 2)**2, *Y) + + return H*F, H*G, H + + +def dmp_fateman_poly_F_3(n, K): + """Fateman's GCD benchmark: sparse inputs (deg f ~ vars f) """ + u = dup_from_raw_dict({n + 1: K.one}, K) + + for i in range(0, n - 1): + u = dmp_add_term([u], dmp_one(i, K), n + 1, i + 1, K) + + v = dmp_add_term(u, dmp_ground(K(2), n - 2), 0, n, K) + + f = dmp_sqr( + dmp_add_term([dmp_neg(v, n - 1, K)], dmp_one(n - 1, K), n + 1, n, K), n, K) + g = dmp_sqr(dmp_add_term([v], dmp_one(n - 1, K), n + 1, n, K), n, K) + + v = dmp_add_term(u, dmp_one(n - 2, K), 0, n - 1, K) + + h = dmp_sqr(dmp_add_term([v], dmp_one(n - 1, K), n + 1, n, K), n, K) + + return dmp_mul(f, h, n, K), dmp_mul(g, h, n, K), h + +# A few useful polynomials from Wang's paper ('78). + +from sympy.polys.rings import ring + +def _f_0(): + R, x, y, z = ring("x,y,z", ZZ) + return x**2*y*z**2 + 2*x**2*y*z + 3*x**2*y + 2*x**2 + 3*x + 4*y**2*z**2 + 5*y**2*z + 6*y**2 + y*z**2 + 2*y*z + y + 1 + +def _f_1(): + R, x, y, z = ring("x,y,z", ZZ) + return x**3*y*z + x**2*y**2*z**2 + x**2*y**2 + 20*x**2*y*z + 30*x**2*y + x**2*z**2 + 10*x**2*z + x*y**3*z + 30*x*y**2*z + 20*x*y**2 + x*y*z**3 + 10*x*y*z**2 + x*y*z + 610*x*y + 20*x*z**2 + 230*x*z + 300*x + y**2*z**2 + 10*y**2*z + 30*y*z**2 + 320*y*z + 200*y + 600*z + 6000 + +def _f_2(): + R, x, y, z = ring("x,y,z", ZZ) + return x**5*y**3 + x**5*y**2*z + x**5*y*z**2 + x**5*z**3 + x**3*y**2 + x**3*y*z + 90*x**3*y + 90*x**3*z + x**2*y**2*z - 11*x**2*y**2 + x**2*z**3 - 11*x**2*z**2 + y*z - 11*y + 90*z - 990 + +def _f_3(): + R, x, y, z = ring("x,y,z", ZZ) + return x**5*y**2 + x**4*z**4 + x**4 + x**3*y**3*z + x**3*z + x**2*y**4 + x**2*y**3*z**3 + x**2*y*z**5 + x**2*y*z + x*y**2*z**4 + x*y**2 + x*y*z**7 + x*y*z**3 + x*y*z**2 + y**2*z + y*z**4 + +def _f_4(): + R, x, y, z = ring("x,y,z", ZZ) + return -x**9*y**8*z - x**8*y**5*z**3 - x**7*y**12*z**2 - 5*x**7*y**8 - x**6*y**9*z**4 + x**6*y**7*z**3 + 3*x**6*y**7*z - 5*x**6*y**5*z**2 - x**6*y**4*z**3 + x**5*y**4*z**5 + 3*x**5*y**4*z**3 - x**5*y*z**5 + x**4*y**11*z**4 + 3*x**4*y**11*z**2 - x**4*y**8*z**4 + 5*x**4*y**7*z**2 + 15*x**4*y**7 - 5*x**4*y**4*z**2 + x**3*y**8*z**6 + 3*x**3*y**8*z**4 - x**3*y**5*z**6 + 5*x**3*y**4*z**4 + 15*x**3*y**4*z**2 + x**3*y**3*z**5 + 3*x**3*y**3*z**3 - 5*x**3*y*z**4 + x**2*z**7 + 3*x**2*z**5 + x*y**7*z**6 + 3*x*y**7*z**4 + 5*x*y**3*z**4 + 15*x*y**3*z**2 + y**4*z**8 + 3*y**4*z**6 + 5*z**6 + 15*z**4 + +def _f_5(): + R, x, y, z = ring("x,y,z", ZZ) + return -x**3 - 3*x**2*y + 3*x**2*z - 3*x*y**2 + 6*x*y*z - 3*x*z**2 - y**3 + 3*y**2*z - 3*y*z**2 + z**3 + +def _f_6(): + R, x, y, z, t = ring("x,y,z,t", ZZ) + return 2115*x**4*y + 45*x**3*z**3*t**2 - 45*x**3*t**2 - 423*x*y**4 - 47*x*y**3 + 141*x*y*z**3 + 94*x*y*z*t - 9*y**3*z**3*t**2 + 9*y**3*t**2 - y**2*z**3*t**2 + y**2*t**2 + 3*z**6*t**2 + 2*z**4*t**3 - 3*z**3*t**2 - 2*z*t**3 + +def _w_1(): + R, x, y, z = ring("x,y,z", ZZ) + return 4*x**6*y**4*z**2 + 4*x**6*y**3*z**3 - 4*x**6*y**2*z**4 - 4*x**6*y*z**5 + x**5*y**4*z**3 + 12*x**5*y**3*z - x**5*y**2*z**5 + 12*x**5*y**2*z**2 - 12*x**5*y*z**3 - 12*x**5*z**4 + 8*x**4*y**4 + 6*x**4*y**3*z**2 + 8*x**4*y**3*z - 4*x**4*y**2*z**4 + 4*x**4*y**2*z**3 - 8*x**4*y**2*z**2 - 4*x**4*y*z**5 - 2*x**4*y*z**4 - 8*x**4*y*z**3 + 2*x**3*y**4*z + x**3*y**3*z**3 - x**3*y**2*z**5 - 2*x**3*y**2*z**3 + 9*x**3*y**2*z - 12*x**3*y*z**3 + 12*x**3*y*z**2 - 12*x**3*z**4 + 3*x**3*z**3 + 6*x**2*y**3 - 6*x**2*y**2*z**2 + 8*x**2*y**2*z - 2*x**2*y*z**4 - 8*x**2*y*z**3 + 2*x**2*y*z**2 + 2*x*y**3*z - 2*x*y**2*z**3 - 3*x*y*z + 3*x*z**3 - 2*y**2 + 2*y*z**2 + +def _w_2(): + R, x, y = ring("x,y", ZZ) + return 24*x**8*y**3 + 48*x**8*y**2 + 24*x**7*y**5 - 72*x**7*y**2 + 25*x**6*y**4 + 2*x**6*y**3 + 4*x**6*y + 8*x**6 + x**5*y**6 + x**5*y**3 - 12*x**5 + x**4*y**5 - x**4*y**4 - 2*x**4*y**3 + 292*x**4*y**2 - x**3*y**6 + 3*x**3*y**3 - x**2*y**5 + 12*x**2*y**3 + 48*x**2 - 12*y**3 + +def f_polys(): + return _f_0(), _f_1(), _f_2(), _f_3(), _f_4(), _f_5(), _f_6() + +def w_polys(): + return _w_1(), _w_2() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/sqfreetools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/sqfreetools.py new file mode 100644 index 0000000000000000000000000000000000000000..b2bf434cab542a42c0f7d67058e1a3c01857335d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/sqfreetools.py @@ -0,0 +1,795 @@ +"""Square-free decomposition algorithms and related tools. """ + + +from sympy.polys.densearith import ( + dup_neg, dmp_neg, + dup_sub, dmp_sub, + dup_mul, dmp_mul, + dup_quo, dmp_quo, + dup_mul_ground, dmp_mul_ground) +from sympy.polys.densebasic import ( + dup_strip, + dup_LC, dmp_ground_LC, + dmp_zero_p, + dmp_ground, + dup_degree, dmp_degree, dmp_degree_in, dmp_degree_list, + dmp_raise, dmp_inject, + dup_convert) +from sympy.polys.densetools import ( + dup_diff, dmp_diff, dmp_diff_in, + dup_shift, dmp_shift, + dup_monic, dmp_ground_monic, + dup_primitive, dmp_ground_primitive) +from sympy.polys.euclidtools import ( + dup_inner_gcd, dmp_inner_gcd, + dup_gcd, dmp_gcd, + dmp_resultant, dmp_primitive) +from sympy.polys.galoistools import ( + gf_sqf_list, gf_sqf_part) +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + DomainError) + + +def _dup_check_degrees(f, result): + """Sanity check the degrees of a computed factorization in K[x].""" + deg = sum(k * dup_degree(fac) for (fac, k) in result) + assert deg == dup_degree(f) + + +def _dmp_check_degrees(f, u, result): + """Sanity check the degrees of a computed factorization in K[X].""" + degs = [0] * (u + 1) + for fac, k in result: + degs_fac = dmp_degree_list(fac, u) + degs = [d1 + k * d2 for d1, d2 in zip(degs, degs_fac)] + assert tuple(degs) == dmp_degree_list(f, u) + + +def dup_sqf_p(f, K): + """ + Return ``True`` if ``f`` is a square-free polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sqf_p(x**2 - 2*x + 1) + False + >>> R.dup_sqf_p(x**2 - 1) + True + + """ + if not f: + return True + else: + return not dup_degree(dup_gcd(f, dup_diff(f, 1, K), K)) + + +def dmp_sqf_p(f, u, K): + """ + Return ``True`` if ``f`` is a square-free polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sqf_p(x**2 + 2*x*y + y**2) + False + >>> R.dmp_sqf_p(x**2 + y**2) + True + + """ + if dmp_zero_p(f, u): + return True + + for i in range(u+1): + + fp = dmp_diff_in(f, 1, i, u, K) + + if dmp_zero_p(fp, u): + continue + + gcd = dmp_gcd(f, fp, u, K) + + if dmp_degree_in(gcd, i, u) != 0: + return False + + return True + + +def dup_sqf_norm(f, K): + r""" + Find a shift of `f` in `K[x]` that has square-free norm. + + The domain `K` must be an algebraic number field `k(a)` (see :ref:`QQ(a)`). + + Returns `(s,g,r)`, such that `g(x)=f(x-sa)`, `r(x)=\text{Norm}(g(x))` and + `r` is a square-free polynomial over `k`. + + Examples + ======== + + We first create the algebraic number field `K=k(a)=\mathbb{Q}(\sqrt{3})` + and rings `K[x]` and `k[x]`: + + >>> from sympy.polys import ring, QQ + >>> from sympy import sqrt + + >>> K = QQ.algebraic_field(sqrt(3)) + >>> R, x = ring("x", K) + >>> _, X = ring("x", QQ) + + We can now find a square free norm for a shift of `f`: + + >>> f = x**2 - 1 + >>> s, g, r = R.dup_sqf_norm(f) + + The choice of shift `s` is arbitrary and the particular values returned for + `g` and `r` are determined by `s`. + + >>> s == 1 + True + >>> g == x**2 - 2*sqrt(3)*x + 2 + True + >>> r == X**4 - 8*X**2 + 4 + True + + The invariants are: + + >>> g == f.shift(-s*K.unit) + True + >>> g.norm() == r + True + >>> r.is_squarefree + True + + Explanation + =========== + + This is part of Trager's algorithm for factorizing polynomials over + algebraic number fields. In particular this function is algorithm + ``sqfr_norm`` from [Trager76]_. + + See Also + ======== + + dmp_sqf_norm: + Analogous function for multivariate polynomials over ``k(a)``. + dmp_norm: + Computes the norm of `f` directly without any shift. + dup_ext_factor: + Function implementing Trager's algorithm that uses this. + sympy.polys.polytools.sqf_norm: + High-level interface for using this function. + """ + if not K.is_Algebraic: + raise DomainError("ground domain must be algebraic") + + s, g = 0, dmp_raise(K.mod.to_list(), 1, 0, K.dom) + + while True: + h, _ = dmp_inject(f, 0, K, front=True) + r = dmp_resultant(g, h, 1, K.dom) + + if dup_sqf_p(r, K.dom): + break + else: + f, s = dup_shift(f, -K.unit, K), s + 1 + + return s, f, r + + +def _dmp_sqf_norm_shifts(f, u, K): + """Generate a sequence of candidate shifts for dmp_sqf_norm.""" + # + # We want to find a minimal shift if possible because shifting high degree + # variables can be expensive e.g. x**10 -> (x + 1)**10. We try a few easy + # cases first before the final infinite loop that is guaranteed to give + # only finitely many bad shifts (see Trager76 for proof of this in the + # univariate case). + # + + # First the trivial shift [0, 0, ...] + n = u + 1 + s0 = [0] * n + yield s0, f + + # Shift in multiples of the generator of the extension field K + a = K.unit + + # Variables of degree > 0 ordered by increasing degree + d = dmp_degree_list(f, u) + var_indices = [i for di, i in sorted(zip(d, range(u+1))) if di > 0] + + # Now try [1, 0, 0, ...], [0, 1, 0, ...] + for i in var_indices: + s1 = s0.copy() + s1[i] = 1 + a1 = [-a*s1i for s1i in s1] + f1 = dmp_shift(f, a1, u, K) + yield s1, f1 + + # Now try [1, 1, 1, ...], [2, 2, 2, ...] + j = 0 + while True: + j += 1 + sj = [j] * n + aj = [-a*j] * n + fj = dmp_shift(f, aj, u, K) + yield sj, fj + + +def dmp_sqf_norm(f, u, K): + r""" + Find a shift of ``f`` in ``K[X]`` that has square-free norm. + + The domain `K` must be an algebraic number field `k(a)` (see :ref:`QQ(a)`). + + Returns `(s,g,r)`, such that `g(x_1,x_2,\cdots)=f(x_1-s_1 a, x_2 - s_2 a, + \cdots)`, `r(x)=\text{Norm}(g(x))` and `r` is a square-free polynomial over + `k`. + + Examples + ======== + + We first create the algebraic number field `K=k(a)=\mathbb{Q}(i)` and rings + `K[x,y]` and `k[x,y]`: + + >>> from sympy.polys import ring, QQ + >>> from sympy import I + + >>> K = QQ.algebraic_field(I) + >>> R, x, y = ring("x,y", K) + >>> _, X, Y = ring("x,y", QQ) + + We can now find a square free norm for a shift of `f`: + + >>> f = x*y + y**2 + >>> s, g, r = R.dmp_sqf_norm(f) + + The choice of shifts ``s`` is arbitrary and the particular values returned + for ``g`` and ``r`` are determined by ``s``. + + >>> s + [0, 1] + >>> g == x*y - I*x + y**2 - 2*I*y - 1 + True + >>> r == X**2*Y**2 + X**2 + 2*X*Y**3 + 2*X*Y + Y**4 + 2*Y**2 + 1 + True + + The required invariants are: + + >>> g == f.shift_list([-si*K.unit for si in s]) + True + >>> g.norm() == r + True + >>> r.is_squarefree + True + + Explanation + =========== + + This is part of Trager's algorithm for factorizing polynomials over + algebraic number fields. In particular this function is a multivariate + generalization of algorithm ``sqfr_norm`` from [Trager76]_. + + See Also + ======== + + dup_sqf_norm: + Analogous function for univariate polynomials over ``k(a)``. + dmp_norm: + Computes the norm of `f` directly without any shift. + dmp_ext_factor: + Function implementing Trager's algorithm that uses this. + sympy.polys.polytools.sqf_norm: + High-level interface for using this function. + """ + if not u: + s, g, r = dup_sqf_norm(f, K) + return [s], g, r + + if not K.is_Algebraic: + raise DomainError("ground domain must be algebraic") + + g = dmp_raise(K.mod.to_list(), u + 1, 0, K.dom) + + for s, f in _dmp_sqf_norm_shifts(f, u, K): + + h, _ = dmp_inject(f, u, K, front=True) + r = dmp_resultant(g, h, u + 1, K.dom) + + if dmp_sqf_p(r, u, K.dom): + break + + return s, f, r + + +def dmp_norm(f, u, K): + r""" + Norm of ``f`` in ``K[X]``, often not square-free. + + The domain `K` must be an algebraic number field `k(a)` (see :ref:`QQ(a)`). + + Examples + ======== + + We first define the algebraic number field `K = k(a) = \mathbb{Q}(\sqrt{2})`: + + >>> from sympy import QQ, sqrt + >>> from sympy.polys.sqfreetools import dmp_norm + >>> k = QQ + >>> K = k.algebraic_field(sqrt(2)) + + We can now compute the norm of a polynomial `p` in `K[x,y]`: + + >>> p = [[K(1)], [K(1),K.unit]] # x + y + sqrt(2) + >>> N = [[k(1)], [k(2),k(0)], [k(1),k(0),k(-2)]] # x**2 + 2*x*y + y**2 - 2 + >>> dmp_norm(p, 1, K) == N + True + + In higher level functions that is: + + >>> from sympy import expand, roots, minpoly + >>> from sympy.abc import x, y + >>> from math import prod + >>> a = sqrt(2) + >>> e = (x + y + a) + >>> e.as_poly([x, y], extension=a).norm() + Poly(x**2 + 2*x*y + y**2 - 2, x, y, domain='QQ') + + This is equal to the product of the expressions `x + y + a_i` where the + `a_i` are the conjugates of `a`: + + >>> pa = minpoly(a) + >>> pa + _x**2 - 2 + >>> rs = roots(pa, multiple=True) + >>> rs + [sqrt(2), -sqrt(2)] + >>> n = prod(e.subs(a, r) for r in rs) + >>> n + (x + y - sqrt(2))*(x + y + sqrt(2)) + >>> expand(n) + x**2 + 2*x*y + y**2 - 2 + + Explanation + =========== + + Given an algebraic number field `K = k(a)` any element `b` of `K` can be + represented as polynomial function `b=g(a)` where `g` is in `k[x]`. If the + minimal polynomial of `a` over `k` is `p_a` then the roots `a_1`, `a_2`, + `\cdots` of `p_a(x)` are the conjugates of `a`. The norm of `b` is the + product `g(a1) \times g(a2) \times \cdots` and is an element of `k`. + + As in [Trager76]_ we extend this norm to multivariate polynomials over `K`. + If `b(x)` is a polynomial in `k(a)[X]` then we can think of `b` as being + alternately a function `g_X(a)` where `g_X` is an element of `k[X][y]` i.e. + a polynomial function with coefficients that are elements of `k[X]`. Then + the norm of `b` is the product `g_X(a1) \times g_X(a2) \times \cdots` and + will be an element of `k[X]`. + + See Also + ======== + + dmp_sqf_norm: + Compute a shift of `f` so that the `\text{Norm}(f)` is square-free. + sympy.polys.polytools.Poly.norm: + Higher-level function that calls this. + """ + if not K.is_Algebraic: + raise DomainError("ground domain must be algebraic") + + g = dmp_raise(K.mod.to_list(), u + 1, 0, K.dom) + h, _ = dmp_inject(f, u, K, front=True) + + return dmp_resultant(g, h, u + 1, K.dom) + + +def dup_gf_sqf_part(f, K): + """Compute square-free part of ``f`` in ``GF(p)[x]``. """ + f = dup_convert(f, K, K.dom) + g = gf_sqf_part(f, K.mod, K.dom) + return dup_convert(g, K.dom, K) + + +def dmp_gf_sqf_part(f, u, K): + """Compute square-free part of ``f`` in ``GF(p)[X]``. """ + raise NotImplementedError('multivariate polynomials over finite fields') + + +def dup_sqf_part(f, K): + """ + Returns square-free part of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_sqf_part(x**3 - 3*x - 2) + x**2 - x - 2 + + See Also + ======== + + sympy.polys.polytools.Poly.sqf_part + """ + if K.is_FiniteField: + return dup_gf_sqf_part(f, K) + + if not f: + return f + + if K.is_negative(dup_LC(f, K)): + f = dup_neg(f, K) + + gcd = dup_gcd(f, dup_diff(f, 1, K), K) + sqf = dup_quo(f, gcd, K) + + if K.is_Field: + return dup_monic(sqf, K) + else: + return dup_primitive(sqf, K)[1] + + +def dmp_sqf_part(f, u, K): + """ + Returns square-free part of a polynomial in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> R.dmp_sqf_part(x**3 + 2*x**2*y + x*y**2) + x**2 + x*y + + """ + if not u: + return dup_sqf_part(f, K) + + if K.is_FiniteField: + return dmp_gf_sqf_part(f, u, K) + + if dmp_zero_p(f, u): + return f + + if K.is_negative(dmp_ground_LC(f, u, K)): + f = dmp_neg(f, u, K) + + gcd = f + for i in range(u+1): + gcd = dmp_gcd(gcd, dmp_diff_in(f, 1, i, u, K), u, K) + sqf = dmp_quo(f, gcd, u, K) + + if K.is_Field: + return dmp_ground_monic(sqf, u, K) + else: + return dmp_ground_primitive(sqf, u, K)[1] + + +def dup_gf_sqf_list(f, K, all=False): + """Compute square-free decomposition of ``f`` in ``GF(p)[x]``. """ + f_orig = f + + f = dup_convert(f, K, K.dom) + + coeff, factors = gf_sqf_list(f, K.mod, K.dom, all=all) + + for i, (f, k) in enumerate(factors): + factors[i] = (dup_convert(f, K.dom, K), k) + + _dup_check_degrees(f_orig, factors) + + return K.convert(coeff, K.dom), factors + + +def dmp_gf_sqf_list(f, u, K, all=False): + """Compute square-free decomposition of ``f`` in ``GF(p)[X]``. """ + raise NotImplementedError('multivariate polynomials over finite fields') + + +def dup_sqf_list(f, K, all=False): + """ + Return square-free decomposition of a polynomial in ``K[x]``. + + Uses Yun's algorithm from [Yun76]_. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> f = 2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16 + + >>> R.dup_sqf_list(f) + (2, [(x + 1, 2), (x + 2, 3)]) + >>> R.dup_sqf_list(f, all=True) + (2, [(1, 1), (x + 1, 2), (x + 2, 3)]) + + See Also + ======== + + dmp_sqf_list: + Corresponding function for multivariate polynomials. + sympy.polys.polytools.sqf_list: + High-level function for square-free factorization of expressions. + sympy.polys.polytools.Poly.sqf_list: + Analogous method on :class:`~.Poly`. + + References + ========== + + [Yun76]_ + """ + if K.is_FiniteField: + return dup_gf_sqf_list(f, K, all=all) + + f_orig = f + + if K.is_Field: + coeff = dup_LC(f, K) + f = dup_monic(f, K) + else: + coeff, f = dup_primitive(f, K) + + if K.is_negative(dup_LC(f, K)): + f = dup_neg(f, K) + coeff = -coeff + + if dup_degree(f) <= 0: + return coeff, [] + + result, i = [], 1 + + h = dup_diff(f, 1, K) + g, p, q = dup_inner_gcd(f, h, K) + + while True: + d = dup_diff(p, 1, K) + h = dup_sub(q, d, K) + + if not h: + result.append((p, i)) + break + + g, p, q = dup_inner_gcd(p, h, K) + + if all or dup_degree(g) > 0: + result.append((g, i)) + + i += 1 + + _dup_check_degrees(f_orig, result) + + return coeff, result + + +def dup_sqf_list_include(f, K, all=False): + """ + Return square-free decomposition of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> f = 2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16 + + >>> R.dup_sqf_list_include(f) + [(2, 1), (x + 1, 2), (x + 2, 3)] + >>> R.dup_sqf_list_include(f, all=True) + [(2, 1), (x + 1, 2), (x + 2, 3)] + + """ + coeff, factors = dup_sqf_list(f, K, all=all) + + if factors and factors[0][1] == 1: + g = dup_mul_ground(factors[0][0], coeff, K) + return [(g, 1)] + factors[1:] + else: + g = dup_strip([coeff]) + return [(g, 1)] + factors + + +def dmp_sqf_list(f, u, K, all=False): + """ + Return square-free decomposition of a polynomial in `K[X]`. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**5 + 2*x**4*y + x**3*y**2 + + >>> R.dmp_sqf_list(f) + (1, [(x + y, 2), (x, 3)]) + >>> R.dmp_sqf_list(f, all=True) + (1, [(1, 1), (x + y, 2), (x, 3)]) + + Explanation + =========== + + Uses Yun's algorithm for univariate polynomials from [Yun76]_ recursively. + The multivariate polynomial is treated as a univariate polynomial in its + leading variable. Then Yun's algorithm computes the square-free + factorization of the primitive and the content is factored recursively. + + It would be better to use a dedicated algorithm for multivariate + polynomials instead. + + See Also + ======== + + dup_sqf_list: + Corresponding function for univariate polynomials. + sympy.polys.polytools.sqf_list: + High-level function for square-free factorization of expressions. + sympy.polys.polytools.Poly.sqf_list: + Analogous method on :class:`~.Poly`. + """ + if not u: + return dup_sqf_list(f, K, all=all) + + if K.is_FiniteField: + return dmp_gf_sqf_list(f, u, K, all=all) + + f_orig = f + + if K.is_Field: + coeff = dmp_ground_LC(f, u, K) + f = dmp_ground_monic(f, u, K) + else: + coeff, f = dmp_ground_primitive(f, u, K) + + if K.is_negative(dmp_ground_LC(f, u, K)): + f = dmp_neg(f, u, K) + coeff = -coeff + + deg = dmp_degree(f, u) + if deg < 0: + return coeff, [] + + # Yun's algorithm requires the polynomial to be primitive as a univariate + # polynomial in its main variable. + content, f = dmp_primitive(f, u, K) + + result = {} + + if deg != 0: + + h = dmp_diff(f, 1, u, K) + g, p, q = dmp_inner_gcd(f, h, u, K) + + i = 1 + + while True: + d = dmp_diff(p, 1, u, K) + h = dmp_sub(q, d, u, K) + + if dmp_zero_p(h, u): + result[i] = p + break + + g, p, q = dmp_inner_gcd(p, h, u, K) + + if all or dmp_degree(g, u) > 0: + result[i] = g + + i += 1 + + coeff_content, result_content = dmp_sqf_list(content, u-1, K, all=all) + + coeff *= coeff_content + + # Combine factors of the content and primitive part that have the same + # multiplicity to produce a list in ascending order of multiplicity. + for fac, i in result_content: + fac = [fac] + if i in result: + result[i] = dmp_mul(result[i], fac, u, K) + else: + result[i] = fac + + result = [(result[i], i) for i in sorted(result)] + + _dmp_check_degrees(f_orig, u, result) + + return coeff, result + + +def dmp_sqf_list_include(f, u, K, all=False): + """ + Return square-free decomposition of a polynomial in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + >>> f = x**5 + 2*x**4*y + x**3*y**2 + + >>> R.dmp_sqf_list_include(f) + [(1, 1), (x + y, 2), (x, 3)] + >>> R.dmp_sqf_list_include(f, all=True) + [(1, 1), (x + y, 2), (x, 3)] + + """ + if not u: + return dup_sqf_list_include(f, K, all=all) + + coeff, factors = dmp_sqf_list(f, u, K, all=all) + + if factors and factors[0][1] == 1: + g = dmp_mul_ground(factors[0][0], coeff, u, K) + return [(g, 1)] + factors[1:] + else: + g = dmp_ground(coeff, u) + return [(g, 1)] + factors + + +def dup_gff_list(f, K): + """ + Compute greatest factorial factorization of ``f`` in ``K[x]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x = ring("x", ZZ) + + >>> R.dup_gff_list(x**5 + 2*x**4 - x**3 - 2*x**2) + [(x, 1), (x + 2, 4)] + + """ + if not f: + raise ValueError("greatest factorial factorization doesn't exist for a zero polynomial") + + f = dup_monic(f, K) + + if not dup_degree(f): + return [] + else: + g = dup_gcd(f, dup_shift(f, K.one, K), K) + H = dup_gff_list(g, K) + + for i, (h, k) in enumerate(H): + g = dup_mul(g, dup_shift(h, -K(k), K), K) + H[i] = (h, k + 1) + + f = dup_quo(f, g, K) + + if not dup_degree(f): + return H + else: + return [(f, 1)] + H + + +def dmp_gff_list(f, u, K): + """ + Compute greatest factorial factorization of ``f`` in ``K[X]``. + + Examples + ======== + + >>> from sympy.polys import ring, ZZ + >>> R, x,y = ring("x,y", ZZ) + + """ + if not u: + return dup_gff_list(f, K) + else: + raise MultivariatePolynomialError(f) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/subresultants_qq_zz.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/subresultants_qq_zz.py new file mode 100644 index 0000000000000000000000000000000000000000..9ce8d5c88d44022621d13d8e82956e676a7e75ae --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/subresultants_qq_zz.py @@ -0,0 +1,2558 @@ +""" +This module contains functions for the computation +of Euclidean, (generalized) Sturmian, (modified) subresultant +polynomial remainder sequences (prs's) of two polynomials; +included are also three functions for the computation of the +resultant of two polynomials. + +Except for the function res_z(), which computes the resultant +of two polynomials, the pseudo-remainder function prem() +of sympy is _not_ used by any of the functions in the module. + +Instead of prem() we use the function + +rem_z(). + +Included is also the function quo_z(). + +An explanation of why we avoid prem() can be found in the +references stated in the docstring of rem_z(). + +1. Theoretical background: +========================== +Consider the polynomials f, g in Z[x] of degrees deg(f) = n and +deg(g) = m with n >= m. + +Definition 1: +============= +The sign sequence of a polynomial remainder sequence (prs) is the +sequence of signs of the leading coefficients of its polynomials. + +Sign sequences can be computed with the function: + +sign_seq(poly_seq, x) + +Definition 2: +============= +A polynomial remainder sequence (prs) is called complete if the +degree difference between any two consecutive polynomials is 1; +otherwise, it called incomplete. + +It is understood that f, g belong to the sequences mentioned in +the two definitions above. + +1A. Euclidean and subresultant prs's: +===================================== +The subresultant prs of f, g is a sequence of polynomials in Z[x] +analogous to the Euclidean prs, the sequence obtained by applying +on f, g Euclid's algorithm for polynomial greatest common divisors +(gcd) in Q[x]. + +The subresultant prs differs from the Euclidean prs in that the +coefficients of each polynomial in the former sequence are determinants +--- also referred to as subresultants --- of appropriately selected +sub-matrices of sylvester1(f, g, x), Sylvester's matrix of 1840 of +dimensions (n + m) * (n + m). + +Recall that the determinant of sylvester1(f, g, x) itself is +called the resultant of f, g and serves as a criterion of whether +the two polynomials have common roots or not. + +In SymPy the resultant is computed with the function +resultant(f, g, x). This function does _not_ evaluate the +determinant of sylvester(f, g, x, 1); instead, it returns +the last member of the subresultant prs of f, g, multiplied +(if needed) by an appropriate power of -1; see the caveat below. + +In this module we use three functions to compute the +resultant of f, g: +a) res(f, g, x) computes the resultant by evaluating +the determinant of sylvester(f, g, x, 1); +b) res_q(f, g, x) computes the resultant recursively, by +performing polynomial divisions in Q[x] with the function rem(); +c) res_z(f, g, x) computes the resultant recursively, by +performing polynomial divisions in Z[x] with the function prem(). + +Caveat: If Df = degree(f, x) and Dg = degree(g, x), then: + +resultant(f, g, x) = (-1)**(Df*Dg) * resultant(g, f, x). + +For complete prs's the sign sequence of the Euclidean prs of f, g +is identical to the sign sequence of the subresultant prs of f, g +and the coefficients of one sequence are easily computed from the +coefficients of the other. + +For incomplete prs's the polynomials in the subresultant prs, generally +differ in sign from those of the Euclidean prs, and --- unlike the +case of complete prs's --- it is not at all obvious how to compute +the coefficients of one sequence from the coefficients of the other. + +1B. Sturmian and modified subresultant prs's: +============================================= +For the same polynomials f, g in Z[x] mentioned above, their ``modified'' +subresultant prs is a sequence of polynomials similar to the Sturmian +prs, the sequence obtained by applying in Q[x] Sturm's algorithm on f, g. + +The two sequences differ in that the coefficients of each polynomial +in the modified subresultant prs are the determinants --- also referred +to as modified subresultants --- of appropriately selected sub-matrices +of sylvester2(f, g, x), Sylvester's matrix of 1853 of dimensions 2n x 2n. + +The determinant of sylvester2 itself is called the modified resultant +of f, g and it also can serve as a criterion of whether the two +polynomials have common roots or not. + +For complete prs's the sign sequence of the Sturmian prs of f, g is +identical to the sign sequence of the modified subresultant prs of +f, g and the coefficients of one sequence are easily computed from +the coefficients of the other. + +For incomplete prs's the polynomials in the modified subresultant prs, +generally differ in sign from those of the Sturmian prs, and --- unlike +the case of complete prs's --- it is not at all obvious how to compute +the coefficients of one sequence from the coefficients of the other. + +As Sylvester pointed out, the coefficients of the polynomial remainders +obtained as (modified) subresultants are the smallest possible without +introducing rationals and without computing (integer) greatest common +divisors. + +1C. On terminology: +=================== +Whence the terminology? Well generalized Sturmian prs's are +``modifications'' of Euclidean prs's; the hint came from the title +of the Pell-Gordon paper of 1917. + +In the literature one also encounters the name ``non signed'' and +``signed'' prs for Euclidean and Sturmian prs respectively. + +Likewise ``non signed'' and ``signed'' subresultant prs for +subresultant and modified subresultant prs respectively. + +2. Functions in the module: +=========================== +No function utilizes SymPy's function prem(). + +2A. Matrices: +============= +The functions sylvester(f, g, x, method=1) and +sylvester(f, g, x, method=2) compute either Sylvester matrix. +They can be used to compute (modified) subresultant prs's by +direct determinant evaluation. + +The function bezout(f, g, x, method='prs') provides a matrix of +smaller dimensions than either Sylvester matrix. It is the function +of choice for computing (modified) subresultant prs's by direct +determinant evaluation. + +sylvester(f, g, x, method=1) +sylvester(f, g, x, method=2) +bezout(f, g, x, method='prs') + +The following identity holds: + +bezout(f, g, x, method='prs') = +backward_eye(deg(f))*bezout(f, g, x, method='bz')*backward_eye(deg(f)) + +2B. Subresultant and modified subresultant prs's by +=================================================== +determinant evaluations: +======================= +We use the Sylvester matrices of 1840 and 1853 to +compute, respectively, subresultant and modified +subresultant polynomial remainder sequences. However, +for large matrices this approach takes a lot of time. + +Instead of utilizing the Sylvester matrices, we can +employ the Bezout matrix which is of smaller dimensions. + +subresultants_sylv(f, g, x) +modified_subresultants_sylv(f, g, x) +subresultants_bezout(f, g, x) +modified_subresultants_bezout(f, g, x) + +2C. Subresultant prs's by ONE determinant evaluation: +===================================================== +All three functions in this section evaluate one determinant +per remainder polynomial; this is the determinant of an +appropriately selected sub-matrix of sylvester1(f, g, x), +Sylvester's matrix of 1840. + +To compute the remainder polynomials the function +subresultants_rem(f, g, x) employs rem(f, g, x). +By contrast, the other two functions implement Van Vleck's ideas +of 1900 and compute the remainder polynomials by trinagularizing +sylvester2(f, g, x), Sylvester's matrix of 1853. + + +subresultants_rem(f, g, x) +subresultants_vv(f, g, x) +subresultants_vv_2(f, g, x). + +2E. Euclidean, Sturmian prs's in Q[x]: +====================================== +euclid_q(f, g, x) +sturm_q(f, g, x) + +2F. Euclidean, Sturmian and (modified) subresultant prs's P-G: +============================================================== +All functions in this section are based on the Pell-Gordon (P-G) +theorem of 1917. +Computations are done in Q[x], employing the function rem(f, g, x) +for the computation of the remainder polynomials. + +euclid_pg(f, g, x) +sturm pg(f, g, x) +subresultants_pg(f, g, x) +modified_subresultants_pg(f, g, x) + +2G. Euclidean, Sturmian and (modified) subresultant prs's A-M-V: +================================================================ +All functions in this section are based on the Akritas-Malaschonok- +Vigklas (A-M-V) theorem of 2015. +Computations are done in Z[x], employing the function rem_z(f, g, x) +for the computation of the remainder polynomials. + +euclid_amv(f, g, x) +sturm_amv(f, g, x) +subresultants_amv(f, g, x) +modified_subresultants_amv(f, g, x) + +2Ga. Exception: +=============== +subresultants_amv_q(f, g, x) + +This function employs rem(f, g, x) for the computation of +the remainder polynomials, despite the fact that it implements +the A-M-V Theorem. + +It is included in our module in order to show that theorems P-G +and A-M-V can be implemented utilizing either the function +rem(f, g, x) or the function rem_z(f, g, x). + +For clearly historical reasons --- since the Collins-Brown-Traub +coefficients-reduction factor beta_i was not available in 1917 --- +we have implemented the Pell-Gordon theorem with the function +rem(f, g, x) and the A-M-V Theorem with the function rem_z(f, g, x). + +2H. Resultants: +=============== +res(f, g, x) +res_q(f, g, x) +res_z(f, g, x) +""" + + +from sympy.concrete.summations import summation +from sympy.core.function import expand +from sympy.core.numbers import nan +from sympy.core.singleton import S +from sympy.core.symbol import Dummy as var +from sympy.functions.elementary.complexes import Abs, sign +from sympy.functions.elementary.integers import floor +from sympy.matrices.dense import eye, Matrix, zeros +from sympy.printing.pretty.pretty import pretty_print as pprint +from sympy.simplify.simplify import simplify +from sympy.polys.domains import QQ +from sympy.polys.polytools import degree, LC, Poly, pquo, quo, prem, rem +from sympy.polys.polyerrors import PolynomialError + + +def sylvester(f, g, x, method = 1): + ''' + The input polynomials f, g are in Z[x] or in Q[x]. Let m = degree(f, x), + n = degree(g, x) and mx = max(m, n). + + a. If method = 1 (default), computes sylvester1, Sylvester's matrix of 1840 + of dimension (m + n) x (m + n). The determinants of properly chosen + submatrices of this matrix (a.k.a. subresultants) can be + used to compute the coefficients of the Euclidean PRS of f, g. + + b. If method = 2, computes sylvester2, Sylvester's matrix of 1853 + of dimension (2*mx) x (2*mx). The determinants of properly chosen + submatrices of this matrix (a.k.a. ``modified'' subresultants) can be + used to compute the coefficients of the Sturmian PRS of f, g. + + Applications of these Matrices can be found in the references below. + Especially, for applications of sylvester2, see the first reference!! + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On a Theorem + by Van Vleck Regarding Sturm Sequences. Serdica Journal of Computing, + Vol. 7, No 4, 101-134, 2013. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + ''' + # obtain degrees of polys + m, n = degree( Poly(f, x), x), degree( Poly(g, x), x) + + # Special cases: + # A:: case m = n < 0 (i.e. both polys are 0) + if m == n and n < 0: + return Matrix([]) + + # B:: case m = n = 0 (i.e. both polys are constants) + if m == n and n == 0: + return Matrix([]) + + # C:: m == 0 and n < 0 or m < 0 and n == 0 + # (i.e. one poly is constant and the other is 0) + if m == 0 and n < 0: + return Matrix([]) + elif m < 0 and n == 0: + return Matrix([]) + + # D:: m >= 1 and n < 0 or m < 0 and n >=1 + # (i.e. one poly is of degree >=1 and the other is 0) + if m >= 1 and n < 0: + return Matrix([0]) + elif m < 0 and n >= 1: + return Matrix([0]) + + fp = Poly(f, x).all_coeffs() + gp = Poly(g, x).all_coeffs() + + # Sylvester's matrix of 1840 (default; a.k.a. sylvester1) + if method <= 1: + M = zeros(m + n) + k = 0 + for i in range(n): + j = k + for coeff in fp: + M[i, j] = coeff + j = j + 1 + k = k + 1 + k = 0 + for i in range(n, m + n): + j = k + for coeff in gp: + M[i, j] = coeff + j = j + 1 + k = k + 1 + return M + + # Sylvester's matrix of 1853 (a.k.a sylvester2) + else: + if len(fp) < len(gp): + h = [] + for i in range(len(gp) - len(fp)): + h.append(0) + fp[ : 0] = h + else: + h = [] + for i in range(len(fp) - len(gp)): + h.append(0) + gp[ : 0] = h + mx = max(m, n) + dim = 2*mx + M = zeros( dim ) + k = 0 + for i in range( mx ): + j = k + for coeff in fp: + M[2*i, j] = coeff + j = j + 1 + j = k + for coeff in gp: + M[2*i + 1, j] = coeff + j = j + 1 + k = k + 1 + return M + +def process_matrix_output(poly_seq, x): + """ + poly_seq is a polynomial remainder sequence computed either by + (modified_)subresultants_bezout or by (modified_)subresultants_sylv. + + This function removes from poly_seq all zero polynomials as well + as all those whose degree is equal to the degree of a preceding + polynomial in poly_seq, as we scan it from left to right. + + """ + L = poly_seq[:] # get a copy of the input sequence + d = degree(L[1], x) + i = 2 + while i < len(L): + d_i = degree(L[i], x) + if d_i < 0: # zero poly + L.remove(L[i]) + i = i - 1 + if d == d_i: # poly degree equals degree of previous poly + L.remove(L[i]) + i = i - 1 + if d_i >= 0: + d = d_i + i = i + 1 + + return L + +def subresultants_sylv(f, g, x): + """ + The input polynomials f, g are in Z[x] or in Q[x]. It is assumed + that deg(f) >= deg(g). + + Computes the subresultant polynomial remainder sequence (prs) + of f, g by evaluating determinants of appropriately selected + submatrices of sylvester(f, g, x, 1). The dimensions of the + latter are (deg(f) + deg(g)) x (deg(f) + deg(g)). + + Each coefficient is computed by evaluating the determinant of the + corresponding submatrix of sylvester(f, g, x, 1). + + If the subresultant prs is complete, then the output coincides + with the Euclidean sequence of the polynomials f, g. + + References: + =========== + 1. G.M.Diaz-Toca,L.Gonzalez-Vega: Various New Expressions for Subresultants + and Their Applications. Appl. Algebra in Engin., Communic. and Comp., + Vol. 15, 233-266, 2004. + + """ + + # make sure neither f nor g is 0 + if f == 0 or g == 0: + return [f, g] + + n = degF = degree(f, x) + m = degG = degree(g, x) + + # make sure proper degrees + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, degF, degG, f, g = m, n, degG, degF, g, f + if n > 0 and m == 0: + return [f, g] + + SR_L = [f, g] # subresultant list + + # form matrix sylvester(f, g, x, 1) + S = sylvester(f, g, x, 1) + + # pick appropriate submatrices of S + # and form subresultant polys + j = m - 1 + + while j > 0: + Sp = S[:, :] # copy of S + # delete last j rows of coeffs of g + for ind in range(m + n - j, m + n): + Sp.row_del(m + n - j) + # delete last j rows of coeffs of f + for ind in range(m - j, m): + Sp.row_del(m - j) + + # evaluate determinants and form coefficients list + coeff_L, k, l = [], Sp.rows, 0 + while l <= j: + coeff_L.append(Sp[:, 0:k].det()) + Sp.col_swap(k - 1, k + l) + l += 1 + + # form poly and append to SP_L + SR_L.append(Poly(coeff_L, x).as_expr()) + j -= 1 + + # j = 0 + SR_L.append(S.det()) + + return process_matrix_output(SR_L, x) + +def modified_subresultants_sylv(f, g, x): + """ + The input polynomials f, g are in Z[x] or in Q[x]. It is assumed + that deg(f) >= deg(g). + + Computes the modified subresultant polynomial remainder sequence (prs) + of f, g by evaluating determinants of appropriately selected + submatrices of sylvester(f, g, x, 2). The dimensions of the + latter are (2*deg(f)) x (2*deg(f)). + + Each coefficient is computed by evaluating the determinant of the + corresponding submatrix of sylvester(f, g, x, 2). + + If the modified subresultant prs is complete, then the output coincides + with the Sturmian sequence of the polynomials f, g. + + References: + =========== + 1. A. G. Akritas,G.I. Malaschonok and P.S. Vigklas: + Sturm Sequences and Modified Subresultant Polynomial Remainder + Sequences. Serdica Journal of Computing, Vol. 8, No 1, 29--46, 2014. + + """ + + # make sure neither f nor g is 0 + if f == 0 or g == 0: + return [f, g] + + n = degF = degree(f, x) + m = degG = degree(g, x) + + # make sure proper degrees + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, degF, degG, f, g = m, n, degG, degF, g, f + if n > 0 and m == 0: + return [f, g] + + SR_L = [f, g] # modified subresultant list + + # form matrix sylvester(f, g, x, 2) + S = sylvester(f, g, x, 2) + + # pick appropriate submatrices of S + # and form modified subresultant polys + j = m - 1 + + while j > 0: + # delete last 2*j rows of pairs of coeffs of f, g + Sp = S[0:2*n - 2*j, :] # copy of first 2*n - 2*j rows of S + + # evaluate determinants and form coefficients list + coeff_L, k, l = [], Sp.rows, 0 + while l <= j: + coeff_L.append(Sp[:, 0:k].det()) + Sp.col_swap(k - 1, k + l) + l += 1 + + # form poly and append to SP_L + SR_L.append(Poly(coeff_L, x).as_expr()) + j -= 1 + + # j = 0 + SR_L.append(S.det()) + + return process_matrix_output(SR_L, x) + +def res(f, g, x): + """ + The input polynomials f, g are in Z[x] or in Q[x]. + + The output is the resultant of f, g computed by evaluating + the determinant of the matrix sylvester(f, g, x, 1). + + References: + =========== + 1. J. S. Cohen: Computer Algebra and Symbolic Computation + - Mathematical Methods. A. K. Peters, 2003. + + """ + if f == 0 or g == 0: + raise PolynomialError("The resultant of %s and %s is not defined" % (f, g)) + else: + return sylvester(f, g, x, 1).det() + +def res_q(f, g, x): + """ + The input polynomials f, g are in Z[x] or in Q[x]. + + The output is the resultant of f, g computed recursively + by polynomial divisions in Q[x], using the function rem. + See Cohen's book p. 281. + + References: + =========== + 1. J. S. Cohen: Computer Algebra and Symbolic Computation + - Mathematical Methods. A. K. Peters, 2003. + """ + m = degree(f, x) + n = degree(g, x) + if m < n: + return (-1)**(m*n) * res_q(g, f, x) + elif n == 0: # g is a constant + return g**m + else: + r = rem(f, g, x) + if r == 0: + return 0 + else: + s = degree(r, x) + l = LC(g, x) + return (-1)**(m*n) * l**(m-s)*res_q(g, r, x) + +def res_z(f, g, x): + """ + The input polynomials f, g are in Z[x] or in Q[x]. + + The output is the resultant of f, g computed recursively + by polynomial divisions in Z[x], using the function prem(). + See Cohen's book p. 283. + + References: + =========== + 1. J. S. Cohen: Computer Algebra and Symbolic Computation + - Mathematical Methods. A. K. Peters, 2003. + """ + m = degree(f, x) + n = degree(g, x) + if m < n: + return (-1)**(m*n) * res_z(g, f, x) + elif n == 0: # g is a constant + return g**m + else: + r = prem(f, g, x) + if r == 0: + return 0 + else: + delta = m - n + 1 + w = (-1)**(m*n) * res_z(g, r, x) + s = degree(r, x) + l = LC(g, x) + k = delta * n - m + s + return quo(w, l**k, x) + +def sign_seq(poly_seq, x): + """ + Given a sequence of polynomials poly_seq, it returns + the sequence of signs of the leading coefficients of + the polynomials in poly_seq. + + """ + return [sign(LC(poly_seq[i], x)) for i in range(len(poly_seq))] + +def bezout(p, q, x, method='bz'): + """ + The input polynomials p, q are in Z[x] or in Q[x]. Let + mx = max(degree(p, x), degree(q, x)). + + The default option bezout(p, q, x, method='bz') returns Bezout's + symmetric matrix of p and q, of dimensions (mx) x (mx). The + determinant of this matrix is equal to the determinant of sylvester2, + Sylvester's matrix of 1853, whose dimensions are (2*mx) x (2*mx); + however the subresultants of these two matrices may differ. + + The other option, bezout(p, q, x, 'prs'), is of interest to us + in this module because it returns a matrix equivalent to sylvester2. + In this case all subresultants of the two matrices are identical. + + Both the subresultant polynomial remainder sequence (prs) and + the modified subresultant prs of p and q can be computed by + evaluating determinants of appropriately selected submatrices of + bezout(p, q, x, 'prs') --- one determinant per coefficient of the + remainder polynomials. + + The matrices bezout(p, q, x, 'bz') and bezout(p, q, x, 'prs') + are related by the formula + + bezout(p, q, x, 'prs') = + backward_eye(deg(p)) * bezout(p, q, x, 'bz') * backward_eye(deg(p)), + + where backward_eye() is the backward identity function. + + References + ========== + 1. G.M.Diaz-Toca,L.Gonzalez-Vega: Various New Expressions for Subresultants + and Their Applications. Appl. Algebra in Engin., Communic. and Comp., + Vol. 15, 233-266, 2004. + + """ + # obtain degrees of polys + m, n = degree( Poly(p, x), x), degree( Poly(q, x), x) + + # Special cases: + # A:: case m = n < 0 (i.e. both polys are 0) + if m == n and n < 0: + return Matrix([]) + + # B:: case m = n = 0 (i.e. both polys are constants) + if m == n and n == 0: + return Matrix([]) + + # C:: m == 0 and n < 0 or m < 0 and n == 0 + # (i.e. one poly is constant and the other is 0) + if m == 0 and n < 0: + return Matrix([]) + elif m < 0 and n == 0: + return Matrix([]) + + # D:: m >= 1 and n < 0 or m < 0 and n >=1 + # (i.e. one poly is of degree >=1 and the other is 0) + if m >= 1 and n < 0: + return Matrix([0]) + elif m < 0 and n >= 1: + return Matrix([0]) + + y = var('y') + + # expr is 0 when x = y + expr = p * q.subs({x:y}) - p.subs({x:y}) * q + + # hence expr is exactly divisible by x - y + poly = Poly( quo(expr, x-y), x, y) + + # form Bezout matrix and store them in B as indicated to get + # the LC coefficient of each poly either in the first position + # of each row (method='prs') or in the last (method='bz'). + mx = max(m, n) + B = zeros(mx) + for i in range(mx): + for j in range(mx): + if method == 'prs': + B[mx - 1 - i, mx - 1 - j] = poly.nth(i, j) + else: + B[i, j] = poly.nth(i, j) + return B + +def backward_eye(n): + ''' + Returns the backward identity matrix of dimensions n x n. + + Needed to "turn" the Bezout matrices + so that the leading coefficients are first. + See docstring of the function bezout(p, q, x, method='bz'). + ''' + M = eye(n) # identity matrix of order n + + for i in range(int(M.rows / 2)): + M.row_swap(0 + i, M.rows - 1 - i) + + return M + +def subresultants_bezout(p, q, x): + """ + The input polynomials p, q are in Z[x] or in Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant polynomial remainder sequence + of p, q by evaluating determinants of appropriately selected + submatrices of bezout(p, q, x, 'prs'). The dimensions of the + latter are deg(p) x deg(p). + + Each coefficient is computed by evaluating the determinant of the + corresponding submatrix of bezout(p, q, x, 'prs'). + + bezout(p, q, x, 'prs) is used instead of sylvester(p, q, x, 1), + Sylvester's matrix of 1840, because the dimensions of the latter + are (deg(p) + deg(q)) x (deg(p) + deg(q)). + + If the subresultant prs is complete, then the output coincides + with the Euclidean sequence of the polynomials p, q. + + References + ========== + 1. G.M.Diaz-Toca,L.Gonzalez-Vega: Various New Expressions for Subresultants + and Their Applications. Appl. Algebra in Engin., Communic. and Comp., + Vol. 15, 233-266, 2004. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + f, g = p, q + n = degF = degree(f, x) + m = degG = degree(g, x) + + # make sure proper degrees + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, degF, degG, f, g = m, n, degG, degF, g, f + if n > 0 and m == 0: + return [f, g] + + SR_L = [f, g] # subresultant list + F = LC(f, x)**(degF - degG) + + # form the bezout matrix + B = bezout(f, g, x, 'prs') + + # pick appropriate submatrices of B + # and form subresultant polys + if degF > degG: + j = 2 + if degF == degG: + j = 1 + while j <= degF: + M = B[0:j, :] + k, coeff_L = j - 1, [] + while k <= degF - 1: + coeff_L.append(M[:, 0:j].det()) + if k < degF - 1: + M.col_swap(j - 1, k + 1) + k = k + 1 + + # apply Theorem 2.1 in the paper by Toca & Vega 2004 + # to get correct signs + SR_L.append(int((-1)**(j*(j-1)/2)) * (Poly(coeff_L, x) / F).as_expr()) + j = j + 1 + + return process_matrix_output(SR_L, x) + +def modified_subresultants_bezout(p, q, x): + """ + The input polynomials p, q are in Z[x] or in Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the modified subresultant polynomial remainder sequence + of p, q by evaluating determinants of appropriately selected + submatrices of bezout(p, q, x, 'prs'). The dimensions of the + latter are deg(p) x deg(p). + + Each coefficient is computed by evaluating the determinant of the + corresponding submatrix of bezout(p, q, x, 'prs'). + + bezout(p, q, x, 'prs') is used instead of sylvester(p, q, x, 2), + Sylvester's matrix of 1853, because the dimensions of the latter + are 2*deg(p) x 2*deg(p). + + If the modified subresultant prs is complete, and LC( p ) > 0, the output + coincides with the (generalized) Sturm's sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + 2. G.M.Diaz-Toca,L.Gonzalez-Vega: Various New Expressions for Subresultants + and Their Applications. Appl. Algebra in Engin., Communic. and Comp., + Vol. 15, 233-266, 2004. + + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + f, g = p, q + n = degF = degree(f, x) + m = degG = degree(g, x) + + # make sure proper degrees + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, degF, degG, f, g = m, n, degG, degF, g, f + if n > 0 and m == 0: + return [f, g] + + SR_L = [f, g] # subresultant list + + # form the bezout matrix + B = bezout(f, g, x, 'prs') + + # pick appropriate submatrices of B + # and form subresultant polys + if degF > degG: + j = 2 + if degF == degG: + j = 1 + while j <= degF: + M = B[0:j, :] + k, coeff_L = j - 1, [] + while k <= degF - 1: + coeff_L.append(M[:, 0:j].det()) + if k < degF - 1: + M.col_swap(j - 1, k + 1) + k = k + 1 + + ## Theorem 2.1 in the paper by Toca & Vega 2004 is _not needed_ + ## in this case since + ## the bezout matrix is equivalent to sylvester2 + SR_L.append(( Poly(coeff_L, x)).as_expr()) + j = j + 1 + + return process_matrix_output(SR_L, x) + +def sturm_pg(p, q, x, method=0): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the (generalized) Sturm sequence of p and q in Z[x] or Q[x]. + If q = diff(p, x, 1) it is the usual Sturm sequence. + + A. If method == 0, default, the remainder coefficients of the sequence + are (in absolute value) ``modified'' subresultants, which for non-monic + polynomials are greater than the coefficients of the corresponding + subresultants by the factor Abs(LC(p)**( deg(p)- deg(q))). + + B. If method == 1, the remainder coefficients of the sequence are (in + absolute value) subresultants, which for non-monic polynomials are + smaller than the coefficients of the corresponding ``modified'' + subresultants by the factor Abs(LC(p)**( deg(p)- deg(q))). + + If the Sturm sequence is complete, method=0 and LC( p ) > 0, the coefficients + of the polynomials in the sequence are ``modified'' subresultants. + That is, they are determinants of appropriately selected submatrices of + sylvester2, Sylvester's matrix of 1853. In this case the Sturm sequence + coincides with the ``modified'' subresultant prs, of the polynomials + p, q. + + If the Sturm sequence is incomplete and method=0 then the signs of the + coefficients of the polynomials in the sequence may differ from the signs + of the coefficients of the corresponding polynomials in the ``modified'' + subresultant prs; however, the absolute values are the same. + + To compute the coefficients, no determinant evaluation takes place. Instead, + polynomial divisions in Q[x] are performed, using the function rem(p, q, x); + the coefficients of the remainders computed this way become (``modified'') + subresultants with the help of the Pell-Gordon Theorem of 1917. + See also the function euclid_pg(p, q, x). + + References + ========== + 1. Pell A. J., R. L. Gordon. The Modified Remainders Obtained in Finding + the Highest Common Factor of Two Polynomials. Annals of MatheMatics, + Second Series, 18 (1917), No. 4, 188-193. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + d0 = degree(p, x) + d1 = degree(q, x) + if d0 == 0 and d1 == 0: + return [p, q] + if d1 > d0: + d0, d1 = d1, d0 + p, q = q, p + if d0 > 0 and d1 == 0: + return [p,q] + + # make sure LC(p) > 0 + flag = 0 + if LC(p,x) < 0: + flag = 1 + p = -p + q = -q + + # initialize + lcf = LC(p, x)**(d0 - d1) # lcf * subr = modified subr + a0, a1 = p, q # the input polys + sturm_seq = [a0, a1] # the output list + del0 = d0 - d1 # degree difference + rho1 = LC(a1, x) # leading coeff of a1 + exp_deg = d1 - 1 # expected degree of a2 + a2 = - rem(a0, a1, domain=QQ) # first remainder + rho2 = LC(a2,x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + deg_diff_new = exp_deg - d2 # expected - actual degree + del1 = d1 - d2 # degree difference + + # mul_fac is the factor by which a2 is multiplied to + # get integer coefficients + mul_fac_old = rho1**(del0 + del1 - deg_diff_new) + + # append accordingly + if method == 0: + sturm_seq.append( simplify(lcf * a2 * Abs(mul_fac_old))) + else: + sturm_seq.append( simplify( a2 * Abs(mul_fac_old))) + + # main loop + deg_diff_old = deg_diff_new + while d2 > 0: + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + del0 = del1 # update degree difference + exp_deg = d1 - 1 # new expected degree + a2 = - rem(a0, a1, domain=QQ) # new remainder + rho3 = LC(a2, x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + deg_diff_new = exp_deg - d2 # expected - actual degree + del1 = d1 - d2 # degree difference + + # take into consideration the power + # rho1**deg_diff_old that was "left out" + expo_old = deg_diff_old # rho1 raised to this power + expo_new = del0 + del1 - deg_diff_new # rho2 raised to this power + + # update variables and append + mul_fac_new = rho2**(expo_new) * rho1**(expo_old) * mul_fac_old + deg_diff_old, mul_fac_old = deg_diff_new, mul_fac_new + rho1, rho2 = rho2, rho3 + if method == 0: + sturm_seq.append( simplify(lcf * a2 * Abs(mul_fac_old))) + else: + sturm_seq.append( simplify( a2 * Abs(mul_fac_old))) + + if flag: # change the sign of the sequence + sturm_seq = [-i for i in sturm_seq] + + # gcd is of degree > 0 ? + m = len(sturm_seq) + if sturm_seq[m - 1] == nan or sturm_seq[m - 1] == 0: + sturm_seq.pop(m - 1) + + return sturm_seq + +def sturm_q(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the (generalized) Sturm sequence of p and q in Q[x]. + Polynomial divisions in Q[x] are performed, using the function rem(p, q, x). + + The coefficients of the polynomials in the Sturm sequence can be uniquely + determined from the corresponding coefficients of the polynomials found + either in: + + (a) the ``modified'' subresultant prs, (references 1, 2) + + or in + + (b) the subresultant prs (reference 3). + + References + ========== + 1. Pell A. J., R. L. Gordon. The Modified Remainders Obtained in Finding + the Highest Common Factor of Two Polynomials. Annals of MatheMatics, + Second Series, 18 (1917), No. 4, 188-193. + + 2 Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + 3. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + d0 = degree(p, x) + d1 = degree(q, x) + if d0 == 0 and d1 == 0: + return [p, q] + if d1 > d0: + d0, d1 = d1, d0 + p, q = q, p + if d0 > 0 and d1 == 0: + return [p,q] + + # make sure LC(p) > 0 + flag = 0 + if LC(p,x) < 0: + flag = 1 + p = -p + q = -q + + # initialize + a0, a1 = p, q # the input polys + sturm_seq = [a0, a1] # the output list + a2 = -rem(a0, a1, domain=QQ) # first remainder + d2 = degree(a2, x) # degree of a2 + sturm_seq.append( a2 ) + + # main loop + while d2 > 0: + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + a2 = -rem(a0, a1, domain=QQ) # new remainder + d2 = degree(a2, x) # actual degree of a2 + sturm_seq.append( a2 ) + + if flag: # change the sign of the sequence + sturm_seq = [-i for i in sturm_seq] + + # gcd is of degree > 0 ? + m = len(sturm_seq) + if sturm_seq[m - 1] == nan or sturm_seq[m - 1] == 0: + sturm_seq.pop(m - 1) + + return sturm_seq + +def sturm_amv(p, q, x, method=0): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the (generalized) Sturm sequence of p and q in Z[x] or Q[x]. + If q = diff(p, x, 1) it is the usual Sturm sequence. + + A. If method == 0, default, the remainder coefficients of the + sequence are (in absolute value) ``modified'' subresultants, which + for non-monic polynomials are greater than the coefficients of the + corresponding subresultants by the factor Abs(LC(p)**( deg(p)- deg(q))). + + B. If method == 1, the remainder coefficients of the sequence are (in + absolute value) subresultants, which for non-monic polynomials are + smaller than the coefficients of the corresponding ``modified'' + subresultants by the factor Abs( LC(p)**( deg(p)- deg(q)) ). + + If the Sturm sequence is complete, method=0 and LC( p ) > 0, then the + coefficients of the polynomials in the sequence are ``modified'' subresultants. + That is, they are determinants of appropriately selected submatrices of + sylvester2, Sylvester's matrix of 1853. In this case the Sturm sequence + coincides with the ``modified'' subresultant prs, of the polynomials + p, q. + + If the Sturm sequence is incomplete and method=0 then the signs of the + coefficients of the polynomials in the sequence may differ from the signs + of the coefficients of the corresponding polynomials in the ``modified'' + subresultant prs; however, the absolute values are the same. + + To compute the coefficients, no determinant evaluation takes place. + Instead, we first compute the euclidean sequence of p and q using + euclid_amv(p, q, x) and then: (a) change the signs of the remainders in the + Euclidean sequence according to the pattern "-, -, +, +, -, -, +, +,..." + (see Lemma 1 in the 1st reference or Theorem 3 in the 2nd reference) + and (b) if method=0, assuming deg(p) > deg(q), we multiply the remainder + coefficients of the Euclidean sequence times the factor + Abs( LC(p)**( deg(p)- deg(q)) ) to make them modified subresultants. + See also the function sturm_pg(p, q, x). + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On the Remainders + Obtained in Finding the Greatest Common Divisor of Two Polynomials.'' Serdica + Journal of Computing 9(2) (2015), 123-138. + + 3. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Subresultant Polynomial + Remainder Sequences Obtained by Polynomial Divisions in Q[x] or in Z[x].'' + Serdica Journal of Computing 10 (2016), No.3-4, 197-217. + + """ + # compute the euclidean sequence + prs = euclid_amv(p, q, x) + + # defensive + if prs == [] or len(prs) == 2: + return prs + + # the coefficients in prs are subresultants and hence are smaller + # than the corresponding subresultants by the factor + # Abs( LC(prs[0])**( deg(prs[0]) - deg(prs[1])) ); Theorem 2, 2nd reference. + lcf = Abs( LC(prs[0])**( degree(prs[0], x) - degree(prs[1], x) ) ) + + # the signs of the first two polys in the sequence stay the same + sturm_seq = [prs[0], prs[1]] + + # change the signs according to "-, -, +, +, -, -, +, +,..." + # and multiply times lcf if needed + flag = 0 + m = len(prs) + i = 2 + while i <= m-1: + if flag == 0: + sturm_seq.append( - prs[i] ) + i = i + 1 + if i == m: + break + sturm_seq.append( - prs[i] ) + i = i + 1 + flag = 1 + elif flag == 1: + sturm_seq.append( prs[i] ) + i = i + 1 + if i == m: + break + sturm_seq.append( prs[i] ) + i = i + 1 + flag = 0 + + # subresultants or modified subresultants? + if method == 0 and lcf > 1: + aux_seq = [sturm_seq[0], sturm_seq[1]] + for i in range(2, m): + aux_seq.append(simplify(sturm_seq[i] * lcf )) + sturm_seq = aux_seq + + return sturm_seq + +def euclid_pg(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the Euclidean sequence of p and q in Z[x] or Q[x]. + + If the Euclidean sequence is complete the coefficients of the polynomials + in the sequence are subresultants. That is, they are determinants of + appropriately selected submatrices of sylvester1, Sylvester's matrix of 1840. + In this case the Euclidean sequence coincides with the subresultant prs + of the polynomials p, q. + + If the Euclidean sequence is incomplete the signs of the coefficients of the + polynomials in the sequence may differ from the signs of the coefficients of + the corresponding polynomials in the subresultant prs; however, the absolute + values are the same. + + To compute the Euclidean sequence, no determinant evaluation takes place. + We first compute the (generalized) Sturm sequence of p and q using + sturm_pg(p, q, x, 1), in which case the coefficients are (in absolute value) + equal to subresultants. Then we change the signs of the remainders in the + Sturm sequence according to the pattern "-, -, +, +, -, -, +, +,..." ; + see Lemma 1 in the 1st reference or Theorem 3 in the 2nd reference as well as + the function sturm_pg(p, q, x). + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On the Remainders + Obtained in Finding the Greatest Common Divisor of Two Polynomials.'' Serdica + Journal of Computing 9(2) (2015), 123-138. + + 3. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Subresultant Polynomial + Remainder Sequences Obtained by Polynomial Divisions in Q[x] or in Z[x].'' + Serdica Journal of Computing 10 (2016), No.3-4, 197-217. + """ + # compute the sturmian sequence using the Pell-Gordon (or AMV) theorem + # with the coefficients in the prs being (in absolute value) subresultants + prs = sturm_pg(p, q, x, 1) ## any other method would do + + # defensive + if prs == [] or len(prs) == 2: + return prs + + # the signs of the first two polys in the sequence stay the same + euclid_seq = [prs[0], prs[1]] + + # change the signs according to "-, -, +, +, -, -, +, +,..." + flag = 0 + m = len(prs) + i = 2 + while i <= m-1: + if flag == 0: + euclid_seq.append(- prs[i] ) + i = i + 1 + if i == m: + break + euclid_seq.append(- prs[i] ) + i = i + 1 + flag = 1 + elif flag == 1: + euclid_seq.append(prs[i] ) + i = i + 1 + if i == m: + break + euclid_seq.append(prs[i] ) + i = i + 1 + flag = 0 + + return euclid_seq + +def euclid_q(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the Euclidean sequence of p and q in Q[x]. + Polynomial divisions in Q[x] are performed, using the function rem(p, q, x). + + The coefficients of the polynomials in the Euclidean sequence can be uniquely + determined from the corresponding coefficients of the polynomials found + either in: + + (a) the ``modified'' subresultant polynomial remainder sequence, + (references 1, 2) + + or in + + (b) the subresultant polynomial remainder sequence (references 3). + + References + ========== + 1. Pell A. J., R. L. Gordon. The Modified Remainders Obtained in Finding + the Highest Common Factor of Two Polynomials. Annals of MatheMatics, + Second Series, 18 (1917), No. 4, 188-193. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + 3. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + d0 = degree(p, x) + d1 = degree(q, x) + if d0 == 0 and d1 == 0: + return [p, q] + if d1 > d0: + d0, d1 = d1, d0 + p, q = q, p + if d0 > 0 and d1 == 0: + return [p,q] + + # make sure LC(p) > 0 + flag = 0 + if LC(p,x) < 0: + flag = 1 + p = -p + q = -q + + # initialize + a0, a1 = p, q # the input polys + euclid_seq = [a0, a1] # the output list + a2 = rem(a0, a1, domain=QQ) # first remainder + d2 = degree(a2, x) # degree of a2 + euclid_seq.append( a2 ) + + # main loop + while d2 > 0: + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + a2 = rem(a0, a1, domain=QQ) # new remainder + d2 = degree(a2, x) # actual degree of a2 + euclid_seq.append( a2 ) + + if flag: # change the sign of the sequence + euclid_seq = [-i for i in euclid_seq] + + # gcd is of degree > 0 ? + m = len(euclid_seq) + if euclid_seq[m - 1] == nan or euclid_seq[m - 1] == 0: + euclid_seq.pop(m - 1) + + return euclid_seq + +def euclid_amv(f, g, x): + """ + f, g are polynomials in Z[x] or Q[x]. It is assumed + that degree(f, x) >= degree(g, x). + + Computes the Euclidean sequence of p and q in Z[x] or Q[x]. + + If the Euclidean sequence is complete the coefficients of the polynomials + in the sequence are subresultants. That is, they are determinants of + appropriately selected submatrices of sylvester1, Sylvester's matrix of 1840. + In this case the Euclidean sequence coincides with the subresultant prs, + of the polynomials p, q. + + If the Euclidean sequence is incomplete the signs of the coefficients of the + polynomials in the sequence may differ from the signs of the coefficients of + the corresponding polynomials in the subresultant prs; however, the absolute + values are the same. + + To compute the coefficients, no determinant evaluation takes place. + Instead, polynomial divisions in Z[x] or Q[x] are performed, using + the function rem_z(f, g, x); the coefficients of the remainders + computed this way become subresultants with the help of the + Collins-Brown-Traub formula for coefficient reduction. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Subresultant Polynomial + remainder Sequences Obtained by Polynomial Divisions in Q[x] or in Z[x].'' + Serdica Journal of Computing 10 (2016), No.3-4, 197-217. + + """ + # make sure neither f nor g is 0 + if f == 0 or g == 0: + return [f, g] + + # make sure proper degrees + d0 = degree(f, x) + d1 = degree(g, x) + if d0 == 0 and d1 == 0: + return [f, g] + if d1 > d0: + d0, d1 = d1, d0 + f, g = g, f + if d0 > 0 and d1 == 0: + return [f, g] + + # initialize + a0 = f + a1 = g + euclid_seq = [a0, a1] + deg_dif_p1, c = degree(a0, x) - degree(a1, x) + 1, -1 + + # compute the first polynomial of the prs + i = 1 + a2 = rem_z(a0, a1, x) / Abs( (-1)**deg_dif_p1 ) # first remainder + euclid_seq.append( a2 ) + d2 = degree(a2, x) # actual degree of a2 + + # main loop + while d2 >= 1: + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + i += 1 + sigma0 = -LC(a0) + c = (sigma0**(deg_dif_p1 - 1)) / (c**(deg_dif_p1 - 2)) + deg_dif_p1 = degree(a0, x) - d2 + 1 + a2 = rem_z(a0, a1, x) / Abs( (c**(deg_dif_p1 - 1)) * sigma0 ) + euclid_seq.append( a2 ) + d2 = degree(a2, x) # actual degree of a2 + + # gcd is of degree > 0 ? + m = len(euclid_seq) + if euclid_seq[m - 1] == nan or euclid_seq[m - 1] == 0: + euclid_seq.pop(m - 1) + + return euclid_seq + +def modified_subresultants_pg(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the ``modified'' subresultant prs of p and q in Z[x] or Q[x]; + the coefficients of the polynomials in the sequence are + ``modified'' subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester2, Sylvester's matrix of 1853. + + To compute the coefficients, no determinant evaluation takes place. Instead, + polynomial divisions in Q[x] are performed, using the function rem(p, q, x); + the coefficients of the remainders computed this way become ``modified'' + subresultants with the help of the Pell-Gordon Theorem of 1917. + + If the ``modified'' subresultant prs is complete, and LC( p ) > 0, it coincides + with the (generalized) Sturm sequence of the polynomials p, q. + + References + ========== + 1. Pell A. J., R. L. Gordon. The Modified Remainders Obtained in Finding + the Highest Common Factor of Two Polynomials. Annals of MatheMatics, + Second Series, 18 (1917), No. 4, 188-193. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + d0 = degree(p,x) + d1 = degree(q,x) + if d0 == 0 and d1 == 0: + return [p, q] + if d1 > d0: + d0, d1 = d1, d0 + p, q = q, p + if d0 > 0 and d1 == 0: + return [p,q] + + # initialize + k = var('k') # index in summation formula + u_list = [] # of elements (-1)**u_i + subres_l = [p, q] # mod. subr. prs output list + a0, a1 = p, q # the input polys + del0 = d0 - d1 # degree difference + degdif = del0 # save it + rho_1 = LC(a0) # lead. coeff (a0) + + # Initialize Pell-Gordon variables + rho_list_minus_1 = sign( LC(a0, x)) # sign of LC(a0) + rho1 = LC(a1, x) # leading coeff of a1 + rho_list = [ sign(rho1)] # of signs + p_list = [del0] # of degree differences + u = summation(k, (k, 1, p_list[0])) # value of u + u_list.append(u) # of u values + v = sum(p_list) # v value + + # first remainder + exp_deg = d1 - 1 # expected degree of a2 + a2 = - rem(a0, a1, domain=QQ) # first remainder + rho2 = LC(a2, x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + deg_diff_new = exp_deg - d2 # expected - actual degree + del1 = d1 - d2 # degree difference + + # mul_fac is the factor by which a2 is multiplied to + # get integer coefficients + mul_fac_old = rho1**(del0 + del1 - deg_diff_new) + + # update Pell-Gordon variables + p_list.append(1 + deg_diff_new) # deg_diff_new is 0 for complete seq + + # apply Pell-Gordon formula (7) in second reference + num = 1 # numerator of fraction + for u in u_list: + num *= (-1)**u + num = num * (-1)**v + + # denominator depends on complete / incomplete seq + if deg_diff_new == 0: # complete seq + den = 1 + for k in range(len(rho_list)): + den *= rho_list[k]**(p_list[k] + p_list[k + 1]) + den = den * rho_list_minus_1 + else: # incomplete seq + den = 1 + for k in range(len(rho_list)-1): + den *= rho_list[k]**(p_list[k] + p_list[k + 1]) + den = den * rho_list_minus_1 + expo = (p_list[len(rho_list) - 1] + p_list[len(rho_list)] - deg_diff_new) + den = den * rho_list[len(rho_list) - 1]**expo + + # the sign of the determinant depends on sg(num / den) + if sign(num / den) > 0: + subres_l.append( simplify(rho_1**degdif*a2* Abs(mul_fac_old) ) ) + else: + subres_l.append(- simplify(rho_1**degdif*a2* Abs(mul_fac_old) ) ) + + # update Pell-Gordon variables + k = var('k') + rho_list.append( sign(rho2)) + u = summation(k, (k, 1, p_list[len(p_list) - 1])) + u_list.append(u) + v = sum(p_list) + deg_diff_old=deg_diff_new + + # main loop + while d2 > 0: + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + del0 = del1 # update degree difference + exp_deg = d1 - 1 # new expected degree + a2 = - rem(a0, a1, domain=QQ) # new remainder + rho3 = LC(a2, x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + deg_diff_new = exp_deg - d2 # expected - actual degree + del1 = d1 - d2 # degree difference + + # take into consideration the power + # rho1**deg_diff_old that was "left out" + expo_old = deg_diff_old # rho1 raised to this power + expo_new = del0 + del1 - deg_diff_new # rho2 raised to this power + + mul_fac_new = rho2**(expo_new) * rho1**(expo_old) * mul_fac_old + + # update variables + deg_diff_old, mul_fac_old = deg_diff_new, mul_fac_new + rho1, rho2 = rho2, rho3 + + # update Pell-Gordon variables + p_list.append(1 + deg_diff_new) # deg_diff_new is 0 for complete seq + + # apply Pell-Gordon formula (7) in second reference + num = 1 # numerator + for u in u_list: + num *= (-1)**u + num = num * (-1)**v + + # denominator depends on complete / incomplete seq + if deg_diff_new == 0: # complete seq + den = 1 + for k in range(len(rho_list)): + den *= rho_list[k]**(p_list[k] + p_list[k + 1]) + den = den * rho_list_minus_1 + else: # incomplete seq + den = 1 + for k in range(len(rho_list)-1): + den *= rho_list[k]**(p_list[k] + p_list[k + 1]) + den = den * rho_list_minus_1 + expo = (p_list[len(rho_list) - 1] + p_list[len(rho_list)] - deg_diff_new) + den = den * rho_list[len(rho_list) - 1]**expo + + # the sign of the determinant depends on sg(num / den) + if sign(num / den) > 0: + subres_l.append( simplify(rho_1**degdif*a2* Abs(mul_fac_old) ) ) + else: + subres_l.append(- simplify(rho_1**degdif*a2* Abs(mul_fac_old) ) ) + + # update Pell-Gordon variables + k = var('k') + rho_list.append( sign(rho2)) + u = summation(k, (k, 1, p_list[len(p_list) - 1])) + u_list.append(u) + v = sum(p_list) + + # gcd is of degree > 0 ? + m = len(subres_l) + if subres_l[m - 1] == nan or subres_l[m - 1] == 0: + subres_l.pop(m - 1) + + # LC( p ) < 0 + m = len(subres_l) # list may be shorter now due to deg(gcd ) > 0 + if LC( p ) < 0: + aux_seq = [subres_l[0], subres_l[1]] + for i in range(2, m): + aux_seq.append(simplify(subres_l[i] * (-1) )) + subres_l = aux_seq + + return subres_l + +def subresultants_pg(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant prs of p and q in Z[x] or Q[x], from + the modified subresultant prs of p and q. + + The coefficients of the polynomials in these two sequences differ only + in sign and the factor LC(p)**( deg(p)- deg(q)) as stated in + Theorem 2 of the reference. + + The coefficients of the polynomials in the output sequence are + subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester1, Sylvester's matrix of 1840. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: "On the Remainders + Obtained in Finding the Greatest Common Divisor of Two Polynomials." + Serdica Journal of Computing 9(2) (2015), 123-138. + + """ + # compute the modified subresultant prs + lst = modified_subresultants_pg(p,q,x) ## any other method would do + + # defensive + if lst == [] or len(lst) == 2: + return lst + + # the coefficients in lst are modified subresultants and, hence, are + # greater than those of the corresponding subresultants by the factor + # LC(lst[0])**( deg(lst[0]) - deg(lst[1])); see Theorem 2 in reference. + lcf = LC(lst[0])**( degree(lst[0], x) - degree(lst[1], x) ) + + # Initialize the subresultant prs list + subr_seq = [lst[0], lst[1]] + + # compute the degree sequences m_i and j_i of Theorem 2 in reference. + deg_seq = [degree(Poly(poly, x), x) for poly in lst] + deg = deg_seq[0] + deg_seq_s = deg_seq[1:-1] + m_seq = [m-1 for m in deg_seq_s] + j_seq = [deg - m for m in m_seq] + + # compute the AMV factors of Theorem 2 in reference. + fact = [(-1)**( j*(j-1)/S(2) ) for j in j_seq] + + # shortened list without the first two polys + lst_s = lst[2:] + + # poly lst_s[k] is multiplied times fact[k], divided by lcf + # and appended to the subresultant prs list + m = len(fact) + for k in range(m): + if sign(fact[k]) == -1: + subr_seq.append(-lst_s[k] / lcf) + else: + subr_seq.append(lst_s[k] / lcf) + + return subr_seq + +def subresultants_amv_q(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant prs of p and q in Q[x]; + the coefficients of the polynomials in the sequence are + subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester1, Sylvester's matrix of 1840. + + To compute the coefficients, no determinant evaluation takes place. + Instead, polynomial divisions in Q[x] are performed, using the + function rem(p, q, x); the coefficients of the remainders + computed this way become subresultants with the help of the + Akritas-Malaschonok-Vigklas Theorem of 2015. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Subresultant Polynomial + remainder Sequences Obtained by Polynomial Divisions in Q[x] or in Z[x].'' + Serdica Journal of Computing 10 (2016), No.3-4, 197-217. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + d0 = degree(p, x) + d1 = degree(q, x) + if d0 == 0 and d1 == 0: + return [p, q] + if d1 > d0: + d0, d1 = d1, d0 + p, q = q, p + if d0 > 0 and d1 == 0: + return [p, q] + + # initialize + i, s = 0, 0 # counters for remainders & odd elements + p_odd_index_sum = 0 # contains the sum of p_1, p_3, etc + subres_l = [p, q] # subresultant prs output list + a0, a1 = p, q # the input polys + sigma1 = LC(a1, x) # leading coeff of a1 + p0 = d0 - d1 # degree difference + if p0 % 2 == 1: + s += 1 + phi = floor( (s + 1) / 2 ) + mul_fac = 1 + d2 = d1 + + # main loop + while d2 > 0: + i += 1 + a2 = rem(a0, a1, domain= QQ) # new remainder + if i == 1: + sigma2 = LC(a2, x) + else: + sigma3 = LC(a2, x) + sigma1, sigma2 = sigma2, sigma3 + d2 = degree(a2, x) + p1 = d1 - d2 + psi = i + phi + p_odd_index_sum + + # new mul_fac + mul_fac = sigma1**(p0 + 1) * mul_fac + + ## compute the sign of the first fraction in formula (9) of the paper + # numerator + num = (-1)**psi + # denominator + den = sign(mul_fac) + + # the sign of the determinant depends on sign( num / den ) != 0 + if sign(num / den) > 0: + subres_l.append( simplify(expand(a2* Abs(mul_fac)))) + else: + subres_l.append(- simplify(expand(a2* Abs(mul_fac)))) + + ## bring into mul_fac the missing power of sigma if there was a degree gap + if p1 - 1 > 0: + mul_fac = mul_fac * sigma1**(p1 - 1) + + # update AMV variables + a0, a1, d0, d1 = a1, a2, d1, d2 + p0 = p1 + if p0 % 2 ==1: + s += 1 + phi = floor( (s + 1) / 2 ) + if i%2 == 1: + p_odd_index_sum += p0 # p_i has odd index + + # gcd is of degree > 0 ? + m = len(subres_l) + if subres_l[m - 1] == nan or subres_l[m - 1] == 0: + subres_l.pop(m - 1) + + return subres_l + +def compute_sign(base, expo): + ''' + base != 0 and expo >= 0 are integers; + + returns the sign of base**expo without + evaluating the power itself! + ''' + sb = sign(base) + if sb == 1: + return 1 + pe = expo % 2 + if pe == 0: + return -sb + else: + return sb + +def rem_z(p, q, x): + ''' + Intended mainly for p, q polynomials in Z[x] so that, + on dividing p by q, the remainder will also be in Z[x]. (However, + it also works fine for polynomials in Q[x].) It is assumed + that degree(p, x) >= degree(q, x). + + It premultiplies p by the _absolute_ value of the leading coefficient + of q, raised to the power deg(p) - deg(q) + 1 and then performs + polynomial division in Q[x], using the function rem(p, q, x). + + By contrast the function prem(p, q, x) does _not_ use the absolute + value of the leading coefficient of q. + This results not only in ``messing up the signs'' of the Euclidean and + Sturmian prs's as mentioned in the second reference, + but also in violation of the main results of the first and third + references --- Theorem 4 and Theorem 1 respectively. Theorems 4 and 1 + establish a one-to-one correspondence between the Euclidean and the + Sturmian prs of p, q, on one hand, and the subresultant prs of p, q, + on the other. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On the Remainders + Obtained in Finding the Greatest Common Divisor of Two Polynomials.'' + Serdica Journal of Computing, 9(2) (2015), 123-138. + + 2. https://planetMath.org/sturmstheorem + + 3. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result on + the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + ''' + if (p.as_poly().is_univariate and q.as_poly().is_univariate and + p.as_poly().gens == q.as_poly().gens): + delta = (degree(p, x) - degree(q, x) + 1) + return rem(Abs(LC(q, x))**delta * p, q, x) + else: + return prem(p, q, x) + +def quo_z(p, q, x): + """ + Intended mainly for p, q polynomials in Z[x] so that, + on dividing p by q, the quotient will also be in Z[x]. (However, + it also works fine for polynomials in Q[x].) It is assumed + that degree(p, x) >= degree(q, x). + + It premultiplies p by the _absolute_ value of the leading coefficient + of q, raised to the power deg(p) - deg(q) + 1 and then performs + polynomial division in Q[x], using the function quo(p, q, x). + + By contrast the function pquo(p, q, x) does _not_ use the absolute + value of the leading coefficient of q. + + See also function rem_z(p, q, x) for additional comments and references. + + """ + if (p.as_poly().is_univariate and q.as_poly().is_univariate and + p.as_poly().gens == q.as_poly().gens): + delta = (degree(p, x) - degree(q, x) + 1) + return quo(Abs(LC(q, x))**delta * p, q, x) + else: + return pquo(p, q, x) + +def subresultants_amv(f, g, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(f, x) >= degree(g, x). + + Computes the subresultant prs of p and q in Z[x] or Q[x]; + the coefficients of the polynomials in the sequence are + subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester1, Sylvester's matrix of 1840. + + To compute the coefficients, no determinant evaluation takes place. + Instead, polynomial divisions in Z[x] or Q[x] are performed, using + the function rem_z(p, q, x); the coefficients of the remainders + computed this way become subresultants with the help of the + Akritas-Malaschonok-Vigklas Theorem of 2015 and the Collins-Brown- + Traub formula for coefficient reduction. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``A Basic Result + on the Theory of Subresultants.'' Serdica Journal of Computing 10 (2016), No.1, 31-48. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Subresultant Polynomial + remainder Sequences Obtained by Polynomial Divisions in Q[x] or in Z[x].'' + Serdica Journal of Computing 10 (2016), No.3-4, 197-217. + + """ + # make sure neither f nor g is 0 + if f == 0 or g == 0: + return [f, g] + + # make sure proper degrees + d0 = degree(f, x) + d1 = degree(g, x) + if d0 == 0 and d1 == 0: + return [f, g] + if d1 > d0: + d0, d1 = d1, d0 + f, g = g, f + if d0 > 0 and d1 == 0: + return [f, g] + + # initialize + a0 = f + a1 = g + subres_l = [a0, a1] + deg_dif_p1, c = degree(a0, x) - degree(a1, x) + 1, -1 + + # initialize AMV variables + sigma1 = LC(a1, x) # leading coeff of a1 + i, s = 0, 0 # counters for remainders & odd elements + p_odd_index_sum = 0 # contains the sum of p_1, p_3, etc + p0 = deg_dif_p1 - 1 + if p0 % 2 == 1: + s += 1 + phi = floor( (s + 1) / 2 ) + + # compute the first polynomial of the prs + i += 1 + a2 = rem_z(a0, a1, x) / Abs( (-1)**deg_dif_p1 ) # first remainder + sigma2 = LC(a2, x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + p1 = d1 - d2 # degree difference + + # sgn_den is the factor, the denominator 1st fraction of (9), + # by which a2 is multiplied to get integer coefficients + sgn_den = compute_sign( sigma1, p0 + 1 ) + + ## compute sign of the 1st fraction in formula (9) of the paper + # numerator + psi = i + phi + p_odd_index_sum + num = (-1)**psi + # denominator + den = sgn_den + + # the sign of the determinant depends on sign(num / den) != 0 + if sign(num / den) > 0: + subres_l.append( a2 ) + else: + subres_l.append( -a2 ) + + # update AMV variable + if p1 % 2 == 1: + s += 1 + + # bring in the missing power of sigma if there was gap + if p1 - 1 > 0: + sgn_den = sgn_den * compute_sign( sigma1, p1 - 1 ) + + # main loop + while d2 >= 1: + phi = floor( (s + 1) / 2 ) + if i%2 == 1: + p_odd_index_sum += p1 # p_i has odd index + a0, a1, d0, d1 = a1, a2, d1, d2 # update polys and degrees + p0 = p1 # update degree difference + i += 1 + sigma0 = -LC(a0) + c = (sigma0**(deg_dif_p1 - 1)) / (c**(deg_dif_p1 - 2)) + deg_dif_p1 = degree(a0, x) - d2 + 1 + a2 = rem_z(a0, a1, x) / Abs( (c**(deg_dif_p1 - 1)) * sigma0 ) + sigma3 = LC(a2, x) # leading coeff of a2 + d2 = degree(a2, x) # actual degree of a2 + p1 = d1 - d2 # degree difference + psi = i + phi + p_odd_index_sum + + # update variables + sigma1, sigma2 = sigma2, sigma3 + + # new sgn_den + sgn_den = compute_sign( sigma1, p0 + 1 ) * sgn_den + + # compute the sign of the first fraction in formula (9) of the paper + # numerator + num = (-1)**psi + # denominator + den = sgn_den + + # the sign of the determinant depends on sign( num / den ) != 0 + if sign(num / den) > 0: + subres_l.append( a2 ) + else: + subres_l.append( -a2 ) + + # update AMV variable + if p1 % 2 ==1: + s += 1 + + # bring in the missing power of sigma if there was gap + if p1 - 1 > 0: + sgn_den = sgn_den * compute_sign( sigma1, p1 - 1 ) + + # gcd is of degree > 0 ? + m = len(subres_l) + if subres_l[m - 1] == nan or subres_l[m - 1] == 0: + subres_l.pop(m - 1) + + return subres_l + +def modified_subresultants_amv(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the modified subresultant prs of p and q in Z[x] or Q[x], + from the subresultant prs of p and q. + The coefficients of the polynomials in the two sequences differ only + in sign and the factor LC(p)**( deg(p)- deg(q)) as stated in + Theorem 2 of the reference. + + The coefficients of the polynomials in the output sequence are + modified subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester2, Sylvester's matrix of 1853. + + If the modified subresultant prs is complete, and LC( p ) > 0, it coincides + with the (generalized) Sturm's sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: "On the Remainders + Obtained in Finding the Greatest Common Divisor of Two Polynomials." + Serdica Journal of Computing, Serdica Journal of Computing, 9(2) (2015), 123-138. + + """ + # compute the subresultant prs + lst = subresultants_amv(p,q,x) ## any other method would do + + # defensive + if lst == [] or len(lst) == 2: + return lst + + # the coefficients in lst are subresultants and, hence, smaller than those + # of the corresponding modified subresultants by the factor + # LC(lst[0])**( deg(lst[0]) - deg(lst[1])); see Theorem 2. + lcf = LC(lst[0])**( degree(lst[0], x) - degree(lst[1], x) ) + + # Initialize the modified subresultant prs list + subr_seq = [lst[0], lst[1]] + + # compute the degree sequences m_i and j_i of Theorem 2 + deg_seq = [degree(Poly(poly, x), x) for poly in lst] + deg = deg_seq[0] + deg_seq_s = deg_seq[1:-1] + m_seq = [m-1 for m in deg_seq_s] + j_seq = [deg - m for m in m_seq] + + # compute the AMV factors of Theorem 2 + fact = [(-1)**( j*(j-1)/S(2) ) for j in j_seq] + + # shortened list without the first two polys + lst_s = lst[2:] + + # poly lst_s[k] is multiplied times fact[k] and times lcf + # and appended to the subresultant prs list + m = len(fact) + for k in range(m): + if sign(fact[k]) == -1: + subr_seq.append( simplify(-lst_s[k] * lcf) ) + else: + subr_seq.append( simplify(lst_s[k] * lcf) ) + + return subr_seq + +def correct_sign(deg_f, deg_g, s1, rdel, cdel): + """ + Used in various subresultant prs algorithms. + + Evaluates the determinant, (a.k.a. subresultant) of a properly selected + submatrix of s1, Sylvester's matrix of 1840, to get the correct sign + and value of the leading coefficient of a given polynomial remainder. + + deg_f, deg_g are the degrees of the original polynomials p, q for which the + matrix s1 = sylvester(p, q, x, 1) was constructed. + + rdel denotes the expected degree of the remainder; it is the number of + rows to be deleted from each group of rows in s1 as described in the + reference below. + + cdel denotes the expected degree minus the actual degree of the remainder; + it is the number of columns to be deleted --- starting with the last column + forming the square matrix --- from the matrix resulting after the row deletions. + + References + ========== + Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``Sturm Sequences + and Modified Subresultant Polynomial Remainder Sequences.'' + Serdica Journal of Computing, Vol. 8, No 1, 29-46, 2014. + + """ + M = s1[:, :] # copy of matrix s1 + + # eliminate rdel rows from the first deg_g rows + for i in range(M.rows - deg_f - 1, M.rows - deg_f - rdel - 1, -1): + M.row_del(i) + + # eliminate rdel rows from the last deg_f rows + for i in range(M.rows - 1, M.rows - rdel - 1, -1): + M.row_del(i) + + # eliminate cdel columns + for i in range(cdel): + M.col_del(M.rows - 1) + + # define submatrix + Md = M[:, 0: M.rows] + + return Md.det() + +def subresultants_rem(p, q, x): + """ + p, q are polynomials in Z[x] or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant prs of p and q in Z[x] or Q[x]; + the coefficients of the polynomials in the sequence are + subresultants. That is, they are determinants of appropriately + selected submatrices of sylvester1, Sylvester's matrix of 1840. + + To compute the coefficients polynomial divisions in Q[x] are + performed, using the function rem(p, q, x). The coefficients + of the remainders computed this way become subresultants by evaluating + one subresultant per remainder --- that of the leading coefficient. + This way we obtain the correct sign and value of the leading coefficient + of the remainder and we easily ``force'' the rest of the coefficients + to become subresultants. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G.:``Three New Methods for Computing Subresultant + Polynomial Remainder Sequences (PRS's).'' Serdica Journal of Computing 9(1) (2015), 1-26. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + f, g = p, q + n = deg_f = degree(f, x) + m = deg_g = degree(g, x) + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, deg_f, deg_g, f, g = m, n, deg_g, deg_f, g, f + if n > 0 and m == 0: + return [f, g] + + # initialize + s1 = sylvester(f, g, x, 1) + sr_list = [f, g] # subresultant list + + # main loop + while deg_g > 0: + r = rem(p, q, x) + d = degree(r, x) + if d < 0: + return sr_list + + # make coefficients subresultants evaluating ONE determinant + exp_deg = deg_g - 1 # expected degree + sign_value = correct_sign(n, m, s1, exp_deg, exp_deg - d) + r = simplify((r / LC(r, x)) * sign_value) + + # append poly with subresultant coeffs + sr_list.append(r) + + # update degrees and polys + deg_f, deg_g = deg_g, d + p, q = q, r + + # gcd is of degree > 0 ? + m = len(sr_list) + if sr_list[m - 1] == nan or sr_list[m - 1] == 0: + sr_list.pop(m - 1) + + return sr_list + +def pivot(M, i, j): + ''' + M is a matrix, and M[i, j] specifies the pivot element. + + All elements below M[i, j], in the j-th column, will + be zeroed, if they are not already 0, according to + Dodgson-Bareiss' integer preserving transformations. + + References + ========== + 1. Akritas, A. G.: ``A new method for computing polynomial greatest + common divisors and polynomial remainder sequences.'' + Numerische MatheMatik 52, 119-127, 1988. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On a Theorem + by Van Vleck Regarding Sturm Sequences.'' + Serdica Journal of Computing, 7, No 4, 101-134, 2013. + + ''' + ma = M[:, :] # copy of matrix M + rs = ma.rows # No. of rows + cs = ma.cols # No. of cols + for r in range(i+1, rs): + if ma[r, j] != 0: + for c in range(j + 1, cs): + ma[r, c] = ma[i, j] * ma[r, c] - ma[i, c] * ma[r, j] + ma[r, j] = 0 + return ma + +def rotate_r(L, k): + ''' + Rotates right by k. L is a row of a matrix or a list. + + ''' + ll = list(L) + if ll == []: + return [] + for i in range(k): + el = ll.pop(len(ll) - 1) + ll.insert(0, el) + return ll if isinstance(L, list) else Matrix([ll]) + +def rotate_l(L, k): + ''' + Rotates left by k. L is a row of a matrix or a list. + + ''' + ll = list(L) + if ll == []: + return [] + for i in range(k): + el = ll.pop(0) + ll.insert(len(ll) - 1, el) + return ll if isinstance(L, list) else Matrix([ll]) + +def row2poly(row, deg, x): + ''' + Converts the row of a matrix to a poly of degree deg and variable x. + Some entries at the beginning and/or at the end of the row may be zero. + + ''' + k = 0 + poly = [] + leng = len(row) + + # find the beginning of the poly ; i.e. the first + # non-zero element of the row + while row[k] == 0: + k = k + 1 + + # append the next deg + 1 elements to poly + for j in range( deg + 1): + if k + j <= leng: + poly.append(row[k + j]) + + return Poly(poly, x) + +def create_ma(deg_f, deg_g, row1, row2, col_num): + ''' + Creates a ``small'' matrix M to be triangularized. + + deg_f, deg_g are the degrees of the divident and of the + divisor polynomials respectively, deg_g > deg_f. + + The coefficients of the divident poly are the elements + in row2 and those of the divisor poly are the elements + in row1. + + col_num defines the number of columns of the matrix M. + + ''' + if deg_g - deg_f >= 1: + print('Reverse degrees') + return + + m = zeros(deg_f - deg_g + 2, col_num) + + for i in range(deg_f - deg_g + 1): + m[i, :] = rotate_r(row1, i) + m[deg_f - deg_g + 1, :] = row2 + + return m + +def find_degree(M, deg_f): + ''' + Finds the degree of the poly corresponding (after triangularization) + to the _last_ row of the ``small'' matrix M, created by create_ma(). + + deg_f is the degree of the divident poly. + If _last_ row is all 0's returns None. + + ''' + j = deg_f + for i in range(0, M.cols): + if M[M.rows - 1, i] == 0: + j = j - 1 + else: + return max(j, 0) + +def final_touches(s2, r, deg_g): + """ + s2 is sylvester2, r is the row pointer in s2, + deg_g is the degree of the poly last inserted in s2. + + After a gcd of degree > 0 has been found with Van Vleck's + method, and was inserted into s2, if its last term is not + in the last column of s2, then it is inserted as many + times as needed, rotated right by one each time, until + the condition is met. + + """ + R = s2.row(r-1) + + # find the first non zero term + for i in range(s2.cols): + if R[0,i] == 0: + continue + else: + break + + # missing rows until last term is in last column + mr = s2.cols - (i + deg_g + 1) + + # insert them by replacing the existing entries in the row + i = 0 + while mr != 0 and r + i < s2.rows : + s2[r + i, : ] = rotate_r(R, i + 1) + i += 1 + mr -= 1 + + return s2 + +def subresultants_vv(p, q, x, method = 0): + """ + p, q are polynomials in Z[x] (intended) or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant prs of p, q by triangularizing, + in Z[x] or in Q[x], all the smaller matrices encountered in the + process of triangularizing sylvester2, Sylvester's matrix of 1853; + see references 1 and 2 for Van Vleck's method. With each remainder, + sylvester2 gets updated and is prepared to be printed if requested. + + If sylvester2 has small dimensions and you want to see the final, + triangularized matrix use this version with method=1; otherwise, + use either this version with method=0 (default) or the faster version, + subresultants_vv_2(p, q, x), where sylvester2 is used implicitly. + + Sylvester's matrix sylvester1 is also used to compute one + subresultant per remainder; namely, that of the leading + coefficient, in order to obtain the correct sign and to + force the remainder coefficients to become subresultants. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + If the final, triangularized matrix s2 is printed, then: + (a) if deg(p) - deg(q) > 1 or deg( gcd(p, q) ) > 0, several + of the last rows in s2 will remain unprocessed; + (b) if deg(p) - deg(q) == 0, p will not appear in the final matrix. + + References + ========== + 1. Akritas, A. G.: ``A new method for computing polynomial greatest + common divisors and polynomial remainder sequences.'' + Numerische MatheMatik 52, 119-127, 1988. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On a Theorem + by Van Vleck Regarding Sturm Sequences.'' + Serdica Journal of Computing, 7, No 4, 101-134, 2013. + + 3. Akritas, A. G.:``Three New Methods for Computing Subresultant + Polynomial Remainder Sequences (PRS's).'' Serdica Journal of Computing 9(1) (2015), 1-26. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + f, g = p, q + n = deg_f = degree(f, x) + m = deg_g = degree(g, x) + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, deg_f, deg_g, f, g = m, n, deg_g, deg_f, g, f + if n > 0 and m == 0: + return [f, g] + + # initialize + s1 = sylvester(f, g, x, 1) + s2 = sylvester(f, g, x, 2) + sr_list = [f, g] + col_num = 2 * n # columns in s2 + + # make two rows (row0, row1) of poly coefficients + row0 = Poly(f, x, domain = QQ).all_coeffs() + leng0 = len(row0) + for i in range(col_num - leng0): + row0.append(0) + row0 = Matrix([row0]) + row1 = Poly(g,x, domain = QQ).all_coeffs() + leng1 = len(row1) + for i in range(col_num - leng1): + row1.append(0) + row1 = Matrix([row1]) + + # row pointer for deg_f - deg_g == 1; may be reset below + r = 2 + + # modify first rows of s2 matrix depending on poly degrees + if deg_f - deg_g > 1: + r = 1 + # replacing the existing entries in the rows of s2, + # insert row0 (deg_f - deg_g - 1) times, rotated each time + for i in range(deg_f - deg_g - 1): + s2[r + i, : ] = rotate_r(row0, i + 1) + r = r + deg_f - deg_g - 1 + # insert row1 (deg_f - deg_g) times, rotated each time + for i in range(deg_f - deg_g): + s2[r + i, : ] = rotate_r(row1, r + i) + r = r + deg_f - deg_g + + if deg_f - deg_g == 0: + r = 0 + + # main loop + while deg_g > 0: + # create a small matrix M, and triangularize it; + M = create_ma(deg_f, deg_g, row1, row0, col_num) + # will need only the first and last rows of M + for i in range(deg_f - deg_g + 1): + M1 = pivot(M, i, i) + M = M1[:, :] + + # treat last row of M as poly; find its degree + d = find_degree(M, deg_f) + if d is None: + break + exp_deg = deg_g - 1 + + # evaluate one determinant & make coefficients subresultants + sign_value = correct_sign(n, m, s1, exp_deg, exp_deg - d) + poly = row2poly(M[M.rows - 1, :], d, x) + temp2 = LC(poly, x) + poly = simplify((poly / temp2) * sign_value) + + # update s2 by inserting first row of M as needed + row0 = M[0, :] + for i in range(deg_g - d): + s2[r + i, :] = rotate_r(row0, r + i) + r = r + deg_g - d + + # update s2 by inserting last row of M as needed + row1 = rotate_l(M[M.rows - 1, :], deg_f - d) + row1 = (row1 / temp2) * sign_value + for i in range(deg_g - d): + s2[r + i, :] = rotate_r(row1, r + i) + r = r + deg_g - d + + # update degrees + deg_f, deg_g = deg_g, d + + # append poly with subresultant coeffs + sr_list.append(poly) + + # final touches to print the s2 matrix + if method != 0 and s2.rows > 2: + s2 = final_touches(s2, r, deg_g) + pprint(s2) + elif method != 0 and s2.rows == 2: + s2[1, :] = rotate_r(s2.row(1), 1) + pprint(s2) + + return sr_list + +def subresultants_vv_2(p, q, x): + """ + p, q are polynomials in Z[x] (intended) or Q[x]. It is assumed + that degree(p, x) >= degree(q, x). + + Computes the subresultant prs of p, q by triangularizing, + in Z[x] or in Q[x], all the smaller matrices encountered in the + process of triangularizing sylvester2, Sylvester's matrix of 1853; + see references 1 and 2 for Van Vleck's method. + + If the sylvester2 matrix has big dimensions use this version, + where sylvester2 is used implicitly. If you want to see the final, + triangularized matrix sylvester2, then use the first version, + subresultants_vv(p, q, x, 1). + + sylvester1, Sylvester's matrix of 1840, is also used to compute + one subresultant per remainder; namely, that of the leading + coefficient, in order to obtain the correct sign and to + ``force'' the remainder coefficients to become subresultants. + + If the subresultant prs is complete, then it coincides with the + Euclidean sequence of the polynomials p, q. + + References + ========== + 1. Akritas, A. G.: ``A new method for computing polynomial greatest + common divisors and polynomial remainder sequences.'' + Numerische MatheMatik 52, 119-127, 1988. + + 2. Akritas, A. G., G.I. Malaschonok and P.S. Vigklas: ``On a Theorem + by Van Vleck Regarding Sturm Sequences.'' + Serdica Journal of Computing, 7, No 4, 101-134, 2013. + + 3. Akritas, A. G.:``Three New Methods for Computing Subresultant + Polynomial Remainder Sequences (PRS's).'' Serdica Journal of Computing 9(1) (2015), 1-26. + + """ + # make sure neither p nor q is 0 + if p == 0 or q == 0: + return [p, q] + + # make sure proper degrees + f, g = p, q + n = deg_f = degree(f, x) + m = deg_g = degree(g, x) + if n == 0 and m == 0: + return [f, g] + if n < m: + n, m, deg_f, deg_g, f, g = m, n, deg_g, deg_f, g, f + if n > 0 and m == 0: + return [f, g] + + # initialize + s1 = sylvester(f, g, x, 1) + sr_list = [f, g] # subresultant list + col_num = 2 * n # columns in sylvester2 + + # make two rows (row0, row1) of poly coefficients + row0 = Poly(f, x, domain = QQ).all_coeffs() + leng0 = len(row0) + for i in range(col_num - leng0): + row0.append(0) + row0 = Matrix([row0]) + row1 = Poly(g,x, domain = QQ).all_coeffs() + leng1 = len(row1) + for i in range(col_num - leng1): + row1.append(0) + row1 = Matrix([row1]) + + # main loop + while deg_g > 0: + # create a small matrix M, and triangularize it + M = create_ma(deg_f, deg_g, row1, row0, col_num) + for i in range(deg_f - deg_g + 1): + M1 = pivot(M, i, i) + M = M1[:, :] + + # treat last row of M as poly; find its degree + d = find_degree(M, deg_f) + if d is None: + return sr_list + exp_deg = deg_g - 1 + + # evaluate one determinant & make coefficients subresultants + sign_value = correct_sign(n, m, s1, exp_deg, exp_deg - d) + poly = row2poly(M[M.rows - 1, :], d, x) + poly = simplify((poly / LC(poly, x)) * sign_value) + + # append poly with subresultant coeffs + sr_list.append(poly) + + # update degrees and rows + deg_f, deg_g = deg_g, d + row0 = row1 + row1 = Poly(poly, x, domain = QQ).all_coeffs() + leng1 = len(row1) + for i in range(col_num - leng1): + row1.append(0) + row1 = Matrix([row1]) + + return sr_list diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_appellseqs.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_appellseqs.py new file mode 100644 index 0000000000000000000000000000000000000000..f4718a2da272ac6f36a968572dc246ebc699e5c4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_appellseqs.py @@ -0,0 +1,91 @@ +"""Tests for efficient functions for generating Appell sequences.""" +from sympy.core.numbers import Rational as Q +from sympy.polys.polytools import Poly +from sympy.testing.pytest import raises +from sympy.polys.appellseqs import (bernoulli_poly, bernoulli_c_poly, + euler_poly, genocchi_poly, andre_poly) +from sympy.abc import x + +def test_bernoulli_poly(): + raises(ValueError, lambda: bernoulli_poly(-1, x)) + assert bernoulli_poly(1, x, polys=True) == Poly(x - Q(1,2)) + + assert bernoulli_poly(0, x) == 1 + assert bernoulli_poly(1, x) == x - Q(1,2) + assert bernoulli_poly(2, x) == x**2 - x + Q(1,6) + assert bernoulli_poly(3, x) == x**3 - Q(3,2)*x**2 + Q(1,2)*x + assert bernoulli_poly(4, x) == x**4 - 2*x**3 + x**2 - Q(1,30) + assert bernoulli_poly(5, x) == x**5 - Q(5,2)*x**4 + Q(5,3)*x**3 - Q(1,6)*x + assert bernoulli_poly(6, x) == x**6 - 3*x**5 + Q(5,2)*x**4 - Q(1,2)*x**2 + Q(1,42) + + assert bernoulli_poly(1).dummy_eq(x - Q(1,2)) + assert bernoulli_poly(1, polys=True) == Poly(x - Q(1,2)) + +def test_bernoulli_c_poly(): + raises(ValueError, lambda: bernoulli_c_poly(-1, x)) + assert bernoulli_c_poly(1, x, polys=True) == Poly(x, domain='QQ') + + assert bernoulli_c_poly(0, x) == 1 + assert bernoulli_c_poly(1, x) == x + assert bernoulli_c_poly(2, x) == x**2 - Q(1,3) + assert bernoulli_c_poly(3, x) == x**3 - x + assert bernoulli_c_poly(4, x) == x**4 - 2*x**2 + Q(7,15) + assert bernoulli_c_poly(5, x) == x**5 - Q(10,3)*x**3 + Q(7,3)*x + assert bernoulli_c_poly(6, x) == x**6 - 5*x**4 + 7*x**2 - Q(31,21) + + assert bernoulli_c_poly(1).dummy_eq(x) + assert bernoulli_c_poly(1, polys=True) == Poly(x, domain='QQ') + + assert 2**8 * bernoulli_poly(8, (x+1)/2).expand() == bernoulli_c_poly(8, x) + assert 2**9 * bernoulli_poly(9, (x+1)/2).expand() == bernoulli_c_poly(9, x) + +def test_genocchi_poly(): + raises(ValueError, lambda: genocchi_poly(-1, x)) + assert genocchi_poly(2, x, polys=True) == Poly(-2*x + 1) + + assert genocchi_poly(0, x) == 0 + assert genocchi_poly(1, x) == -1 + assert genocchi_poly(2, x) == 1 - 2*x + assert genocchi_poly(3, x) == 3*x - 3*x**2 + assert genocchi_poly(4, x) == -1 + 6*x**2 - 4*x**3 + assert genocchi_poly(5, x) == -5*x + 10*x**3 - 5*x**4 + assert genocchi_poly(6, x) == 3 - 15*x**2 + 15*x**4 - 6*x**5 + + assert genocchi_poly(2).dummy_eq(-2*x + 1) + assert genocchi_poly(2, polys=True) == Poly(-2*x + 1) + + assert 2 * (bernoulli_poly(8, x) - bernoulli_c_poly(8, x)) == genocchi_poly(8, x) + assert 2 * (bernoulli_poly(9, x) - bernoulli_c_poly(9, x)) == genocchi_poly(9, x) + +def test_euler_poly(): + raises(ValueError, lambda: euler_poly(-1, x)) + assert euler_poly(1, x, polys=True) == Poly(x - Q(1,2)) + + assert euler_poly(0, x) == 1 + assert euler_poly(1, x) == x - Q(1,2) + assert euler_poly(2, x) == x**2 - x + assert euler_poly(3, x) == x**3 - Q(3,2)*x**2 + Q(1,4) + assert euler_poly(4, x) == x**4 - 2*x**3 + x + assert euler_poly(5, x) == x**5 - Q(5,2)*x**4 + Q(5,2)*x**2 - Q(1,2) + assert euler_poly(6, x) == x**6 - 3*x**5 + 5*x**3 - 3*x + + assert euler_poly(1).dummy_eq(x - Q(1,2)) + assert euler_poly(1, polys=True) == Poly(x - Q(1,2)) + + assert genocchi_poly(9, x) == euler_poly(8, x) * -9 + assert genocchi_poly(10, x) == euler_poly(9, x) * -10 + +def test_andre_poly(): + raises(ValueError, lambda: andre_poly(-1, x)) + assert andre_poly(1, x, polys=True) == Poly(x) + + assert andre_poly(0, x) == 1 + assert andre_poly(1, x) == x + assert andre_poly(2, x) == x**2 - 1 + assert andre_poly(3, x) == x**3 - 3*x + assert andre_poly(4, x) == x**4 - 6*x**2 + 5 + assert andre_poly(5, x) == x**5 - 10*x**3 + 25*x + assert andre_poly(6, x) == x**6 - 15*x**4 + 75*x**2 - 61 + + assert andre_poly(1).dummy_eq(x) + assert andre_poly(1, polys=True) == Poly(x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_constructor.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_constructor.py new file mode 100644 index 0000000000000000000000000000000000000000..b02d8a4b360dd09b993bbed80cdec307d09908fc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_constructor.py @@ -0,0 +1,236 @@ +"""Tests for tools for constructing domains for expressions. """ + +from sympy.testing.pytest import tooslow + +from sympy.polys.constructor import construct_domain +from sympy.polys.domains import ZZ, QQ, ZZ_I, QQ_I, RR, CC, EX +from sympy.polys.domains.realfield import RealField +from sympy.polys.domains.complexfield import ComplexField + +from sympy.core import (Catalan, GoldenRatio) +from sympy.core.numbers import (E, Float, I, Rational, pi) +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy import rootof + +from sympy.abc import x, y + + +def test_construct_domain(): + + assert construct_domain([1, 2, 3]) == (ZZ, [ZZ(1), ZZ(2), ZZ(3)]) + assert construct_domain([1, 2, 3], field=True) == (QQ, [QQ(1), QQ(2), QQ(3)]) + + assert construct_domain([S.One, S(2), S(3)]) == (ZZ, [ZZ(1), ZZ(2), ZZ(3)]) + assert construct_domain([S.One, S(2), S(3)], field=True) == (QQ, [QQ(1), QQ(2), QQ(3)]) + + assert construct_domain([S.Half, S(2)]) == (QQ, [QQ(1, 2), QQ(2)]) + result = construct_domain([3.14, 1, S.Half]) + assert isinstance(result[0], RealField) + assert result[1] == [RR(3.14), RR(1.0), RR(0.5)] + + result = construct_domain([3.14, I, S.Half]) + assert isinstance(result[0], ComplexField) + assert result[1] == [CC(3.14), CC(1.0j), CC(0.5)] + + assert construct_domain([1.0+I]) == (CC, [CC(1.0, 1.0)]) + assert construct_domain([2.0+3.0*I]) == (CC, [CC(2.0, 3.0)]) + + assert construct_domain([1, I]) == (ZZ_I, [ZZ_I(1, 0), ZZ_I(0, 1)]) + assert construct_domain([1, I/2]) == (QQ_I, [QQ_I(1, 0), QQ_I(0, S.Half)]) + + assert construct_domain([3.14, sqrt(2)], extension=None) == (EX, [EX(3.14), EX(sqrt(2))]) + assert construct_domain([3.14, sqrt(2)], extension=True) == (EX, [EX(3.14), EX(sqrt(2))]) + + assert construct_domain([1, sqrt(2)], extension=None) == (EX, [EX(1), EX(sqrt(2))]) + + assert construct_domain([x, sqrt(x)]) == (EX, [EX(x), EX(sqrt(x))]) + assert construct_domain([x, sqrt(x), sqrt(y)]) == (EX, [EX(x), EX(sqrt(x)), EX(sqrt(y))]) + + alg = QQ.algebraic_field(sqrt(2)) + + assert construct_domain([7, S.Half, sqrt(2)], extension=True) == \ + (alg, [alg.convert(7), alg.convert(S.Half), alg.convert(sqrt(2))]) + + alg = QQ.algebraic_field(sqrt(2) + sqrt(3)) + + assert construct_domain([7, sqrt(2), sqrt(3)], extension=True) == \ + (alg, [alg.convert(7), alg.convert(sqrt(2)), alg.convert(sqrt(3))]) + + dom = ZZ[x] + + assert construct_domain([2*x, 3]) == \ + (dom, [dom.convert(2*x), dom.convert(3)]) + + dom = ZZ[x, y] + + assert construct_domain([2*x, 3*y]) == \ + (dom, [dom.convert(2*x), dom.convert(3*y)]) + + dom = QQ[x] + + assert construct_domain([x/2, 3]) == \ + (dom, [dom.convert(x/2), dom.convert(3)]) + + dom = QQ[x, y] + + assert construct_domain([x/2, 3*y]) == \ + (dom, [dom.convert(x/2), dom.convert(3*y)]) + + dom = ZZ_I[x] + + assert construct_domain([2*x, I]) == \ + (dom, [dom.convert(2*x), dom.convert(I)]) + + dom = ZZ_I[x, y] + + assert construct_domain([2*x, I*y]) == \ + (dom, [dom.convert(2*x), dom.convert(I*y)]) + + dom = QQ_I[x] + + assert construct_domain([x/2, I]) == \ + (dom, [dom.convert(x/2), dom.convert(I)]) + + dom = QQ_I[x, y] + + assert construct_domain([x/2, I*y]) == \ + (dom, [dom.convert(x/2), dom.convert(I*y)]) + + dom = RR[x] + + assert construct_domain([x/2, 3.5]) == \ + (dom, [dom.convert(x/2), dom.convert(3.5)]) + + dom = RR[x, y] + + assert construct_domain([x/2, 3.5*y]) == \ + (dom, [dom.convert(x/2), dom.convert(3.5*y)]) + + dom = CC[x] + + assert construct_domain([I*x/2, 3.5]) == \ + (dom, [dom.convert(I*x/2), dom.convert(3.5)]) + + dom = CC[x, y] + + assert construct_domain([I*x/2, 3.5*y]) == \ + (dom, [dom.convert(I*x/2), dom.convert(3.5*y)]) + + dom = CC[x] + + assert construct_domain([x/2, I*3.5]) == \ + (dom, [dom.convert(x/2), dom.convert(I*3.5)]) + + dom = CC[x, y] + + assert construct_domain([x/2, I*3.5*y]) == \ + (dom, [dom.convert(x/2), dom.convert(I*3.5*y)]) + + dom = ZZ.frac_field(x) + + assert construct_domain([2/x, 3]) == \ + (dom, [dom.convert(2/x), dom.convert(3)]) + + dom = ZZ.frac_field(x, y) + + assert construct_domain([2/x, 3*y]) == \ + (dom, [dom.convert(2/x), dom.convert(3*y)]) + + dom = RR.frac_field(x) + + assert construct_domain([2/x, 3.5]) == \ + (dom, [dom.convert(2/x), dom.convert(3.5)]) + + dom = RR.frac_field(x, y) + + assert construct_domain([2/x, 3.5*y]) == \ + (dom, [dom.convert(2/x), dom.convert(3.5*y)]) + + dom = RealField(prec=336)[x] + + assert construct_domain([pi.evalf(100)*x]) == \ + (dom, [dom.convert(pi.evalf(100)*x)]) + + assert construct_domain(2) == (ZZ, ZZ(2)) + assert construct_domain(S(2)/3) == (QQ, QQ(2, 3)) + assert construct_domain(Rational(2, 3)) == (QQ, QQ(2, 3)) + + assert construct_domain({}) == (ZZ, {}) + + +def test_complex_exponential(): + w = exp(-I*2*pi/3, evaluate=False) + alg = QQ.algebraic_field(w) + assert construct_domain([w**2, w, 1], extension=True) == ( + alg, + [alg.convert(w**2), + alg.convert(w), + alg.convert(1)] + ) + + +def test_rootof(): + r1 = rootof(x**3 + x + 1, 0) + r2 = rootof(x**3 + x + 1, 1) + K1 = QQ.algebraic_field(r1) + K2 = QQ.algebraic_field(r2) + assert construct_domain([r1]) == (EX, [EX(r1)]) + assert construct_domain([r2]) == (EX, [EX(r2)]) + assert construct_domain([r1, r2]) == (EX, [EX(r1), EX(r2)]) + + assert construct_domain([r1], extension=True) == ( + K1, [K1.from_sympy(r1)]) + assert construct_domain([r2], extension=True) == ( + K2, [K2.from_sympy(r2)]) + + +@tooslow +def test_rootof_primitive_element(): + r1 = rootof(x**3 + x + 1, 0) + r2 = rootof(x**3 + x + 1, 1) + K12 = QQ.algebraic_field(r1 + r2) + assert construct_domain([r1, r2], extension=True) == ( + K12, [K12.from_sympy(r1), K12.from_sympy(r2)]) + + +def test_composite_option(): + assert construct_domain({(1,): sin(y)}, composite=False) == \ + (EX, {(1,): EX(sin(y))}) + + assert construct_domain({(1,): y}, composite=False) == \ + (EX, {(1,): EX(y)}) + + assert construct_domain({(1, 1): 1}, composite=False) == \ + (ZZ, {(1, 1): 1}) + + assert construct_domain({(1, 0): y}, composite=False) == \ + (EX, {(1, 0): EX(y)}) + + +def test_precision(): + f1 = Float("1.01") + f2 = Float("1.0000000000000000000001") + for u in [1, 1e-2, 1e-6, 1e-13, 1e-14, 1e-16, 1e-20, 1e-100, 1e-300, + f1, f2]: + result = construct_domain([u]) + v = float(result[1][0]) + assert abs(u - v) / u < 1e-14 # Test relative accuracy + + result = construct_domain([f1]) + y = result[1][0] + assert y-1 > 1e-50 + + result = construct_domain([f2]) + y = result[1][0] + assert y-1 > 1e-50 + + +def test_issue_11538(): + for n in [E, pi, Catalan]: + assert construct_domain(n)[0] == ZZ[n] + assert construct_domain(x + n)[0] == ZZ[x, n] + assert construct_domain(GoldenRatio)[0] == EX + assert construct_domain(x + GoldenRatio)[0] == EX diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densearith.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densearith.py new file mode 100644 index 0000000000000000000000000000000000000000..ebb29d50867ad578274ed11c766e0515d8e4da35 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densearith.py @@ -0,0 +1,1007 @@ +"""Tests for dense recursive polynomials' arithmetics. """ + +from sympy.external.gmpy import GROUND_TYPES + +from sympy.polys.densebasic import ( + dup_normal, dmp_normal, +) + +from sympy.polys.densearith import ( + dup_add_term, dmp_add_term, + dup_sub_term, dmp_sub_term, + dup_mul_term, dmp_mul_term, + dup_add_ground, dmp_add_ground, + dup_sub_ground, dmp_sub_ground, + dup_mul_ground, dmp_mul_ground, + dup_quo_ground, dmp_quo_ground, + dup_exquo_ground, dmp_exquo_ground, + dup_lshift, dup_rshift, + dup_abs, dmp_abs, + dup_neg, dmp_neg, + dup_add, dmp_add, + dup_sub, dmp_sub, + dup_mul, dmp_mul, + dup_sqr, dmp_sqr, + dup_pow, dmp_pow, + dup_add_mul, dmp_add_mul, + dup_sub_mul, dmp_sub_mul, + dup_pdiv, dup_prem, dup_pquo, dup_pexquo, + dmp_pdiv, dmp_prem, dmp_pquo, dmp_pexquo, + dup_rr_div, dmp_rr_div, + dup_ff_div, dmp_ff_div, + dup_div, dup_rem, dup_quo, dup_exquo, + dmp_div, dmp_rem, dmp_quo, dmp_exquo, + dup_max_norm, dmp_max_norm, + dup_l1_norm, dmp_l1_norm, + dup_l2_norm_squared, dmp_l2_norm_squared, + dup_expand, dmp_expand, +) + +from sympy.polys.polyerrors import ( + ExactQuotientFailed, +) + +from sympy.polys.specialpolys import f_polys, Symbol, Poly +from sympy.polys.domains import FF, ZZ, QQ, CC + +from sympy.testing.pytest import raises + +x = Symbol('x') + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = [ f.to_dense() for f in f_polys() ] +F_0 = dmp_mul_ground(dmp_normal(f_0, 2, QQ), QQ(1, 7), 2, QQ) + +def test_dup_add_term(): + f = dup_normal([], ZZ) + + assert dup_add_term(f, ZZ(0), 0, ZZ) == dup_normal([], ZZ) + + assert dup_add_term(f, ZZ(1), 0, ZZ) == dup_normal([1], ZZ) + assert dup_add_term(f, ZZ(1), 1, ZZ) == dup_normal([1, 0], ZZ) + assert dup_add_term(f, ZZ(1), 2, ZZ) == dup_normal([1, 0, 0], ZZ) + + f = dup_normal([1, 1, 1], ZZ) + + assert dup_add_term(f, ZZ(1), 0, ZZ) == dup_normal([1, 1, 2], ZZ) + assert dup_add_term(f, ZZ(1), 1, ZZ) == dup_normal([1, 2, 1], ZZ) + assert dup_add_term(f, ZZ(1), 2, ZZ) == dup_normal([2, 1, 1], ZZ) + + assert dup_add_term(f, ZZ(1), 3, ZZ) == dup_normal([1, 1, 1, 1], ZZ) + assert dup_add_term(f, ZZ(1), 4, ZZ) == dup_normal([1, 0, 1, 1, 1], ZZ) + assert dup_add_term(f, ZZ(1), 5, ZZ) == dup_normal([1, 0, 0, 1, 1, 1], ZZ) + assert dup_add_term( + f, ZZ(1), 6, ZZ) == dup_normal([1, 0, 0, 0, 1, 1, 1], ZZ) + + assert dup_add_term(f, ZZ(-1), 2, ZZ) == dup_normal([1, 1], ZZ) + + +def test_dmp_add_term(): + assert dmp_add_term([ZZ(1), ZZ(1), ZZ(1)], ZZ(1), 2, 0, ZZ) == \ + dup_add_term([ZZ(1), ZZ(1), ZZ(1)], ZZ(1), 2, ZZ) + assert dmp_add_term(f_0, [[]], 3, 2, ZZ) == f_0 + assert dmp_add_term(F_0, [[]], 3, 2, QQ) == F_0 + + +def test_dup_sub_term(): + f = dup_normal([], ZZ) + + assert dup_sub_term(f, ZZ(0), 0, ZZ) == dup_normal([], ZZ) + + assert dup_sub_term(f, ZZ(1), 0, ZZ) == dup_normal([-1], ZZ) + assert dup_sub_term(f, ZZ(1), 1, ZZ) == dup_normal([-1, 0], ZZ) + assert dup_sub_term(f, ZZ(1), 2, ZZ) == dup_normal([-1, 0, 0], ZZ) + + f = dup_normal([1, 1, 1], ZZ) + + assert dup_sub_term(f, ZZ(2), 0, ZZ) == dup_normal([ 1, 1, -1], ZZ) + assert dup_sub_term(f, ZZ(2), 1, ZZ) == dup_normal([ 1, -1, 1], ZZ) + assert dup_sub_term(f, ZZ(2), 2, ZZ) == dup_normal([-1, 1, 1], ZZ) + + assert dup_sub_term(f, ZZ(1), 3, ZZ) == dup_normal([-1, 1, 1, 1], ZZ) + assert dup_sub_term(f, ZZ(1), 4, ZZ) == dup_normal([-1, 0, 1, 1, 1], ZZ) + assert dup_sub_term(f, ZZ(1), 5, ZZ) == dup_normal([-1, 0, 0, 1, 1, 1], ZZ) + assert dup_sub_term( + f, ZZ(1), 6, ZZ) == dup_normal([-1, 0, 0, 0, 1, 1, 1], ZZ) + + assert dup_sub_term(f, ZZ(1), 2, ZZ) == dup_normal([1, 1], ZZ) + + +def test_dmp_sub_term(): + assert dmp_sub_term([ZZ(1), ZZ(1), ZZ(1)], ZZ(1), 2, 0, ZZ) == \ + dup_sub_term([ZZ(1), ZZ(1), ZZ(1)], ZZ(1), 2, ZZ) + assert dmp_sub_term(f_0, [[]], 3, 2, ZZ) == f_0 + assert dmp_sub_term(F_0, [[]], 3, 2, QQ) == F_0 + + +def test_dup_mul_term(): + f = dup_normal([], ZZ) + + assert dup_mul_term(f, ZZ(2), 3, ZZ) == dup_normal([], ZZ) + + f = dup_normal([1, 1], ZZ) + + assert dup_mul_term(f, ZZ(0), 3, ZZ) == dup_normal([], ZZ) + + f = dup_normal([1, 2, 3], ZZ) + + assert dup_mul_term(f, ZZ(2), 0, ZZ) == dup_normal([2, 4, 6], ZZ) + assert dup_mul_term(f, ZZ(2), 1, ZZ) == dup_normal([2, 4, 6, 0], ZZ) + assert dup_mul_term(f, ZZ(2), 2, ZZ) == dup_normal([2, 4, 6, 0, 0], ZZ) + assert dup_mul_term(f, ZZ(2), 3, ZZ) == dup_normal([2, 4, 6, 0, 0, 0], ZZ) + + +def test_dmp_mul_term(): + assert dmp_mul_term([ZZ(1), ZZ(2), ZZ(3)], ZZ(2), 1, 0, ZZ) == \ + dup_mul_term([ZZ(1), ZZ(2), ZZ(3)], ZZ(2), 1, ZZ) + + assert dmp_mul_term([[]], [ZZ(2)], 3, 1, ZZ) == [[]] + assert dmp_mul_term([[ZZ(1)]], [], 3, 1, ZZ) == [[]] + + assert dmp_mul_term([[ZZ(1), ZZ(2)], [ZZ(3)]], [ZZ(2)], 2, 1, ZZ) == \ + [[ZZ(2), ZZ(4)], [ZZ(6)], [], []] + + assert dmp_mul_term([[]], [QQ(2, 3)], 3, 1, QQ) == [[]] + assert dmp_mul_term([[QQ(1, 2)]], [], 3, 1, QQ) == [[]] + + assert dmp_mul_term([[QQ(1, 5), QQ(2, 5)], [QQ(3, 5)]], [QQ(2, 3)], 2, 1, QQ) == \ + [[QQ(2, 15), QQ(4, 15)], [QQ(6, 15)], [], []] + + +def test_dup_add_ground(): + f = ZZ.map([1, 2, 3, 4]) + g = ZZ.map([1, 2, 3, 8]) + + assert dup_add_ground(f, ZZ(4), ZZ) == g + + +def test_dmp_add_ground(): + f = ZZ.map([[1], [2], [3], [4]]) + g = ZZ.map([[1], [2], [3], [8]]) + + assert dmp_add_ground(f, ZZ(4), 1, ZZ) == g + + +def test_dup_sub_ground(): + f = ZZ.map([1, 2, 3, 4]) + g = ZZ.map([1, 2, 3, 0]) + + assert dup_sub_ground(f, ZZ(4), ZZ) == g + + +def test_dmp_sub_ground(): + f = ZZ.map([[1], [2], [3], [4]]) + g = ZZ.map([[1], [2], [3], []]) + + assert dmp_sub_ground(f, ZZ(4), 1, ZZ) == g + + +def test_dup_mul_ground(): + f = dup_normal([], ZZ) + + assert dup_mul_ground(f, ZZ(2), ZZ) == dup_normal([], ZZ) + + f = dup_normal([1, 2, 3], ZZ) + + assert dup_mul_ground(f, ZZ(0), ZZ) == dup_normal([], ZZ) + assert dup_mul_ground(f, ZZ(2), ZZ) == dup_normal([2, 4, 6], ZZ) + + +def test_dmp_mul_ground(): + assert dmp_mul_ground(f_0, ZZ(2), 2, ZZ) == [ + [[ZZ(2), ZZ(4), ZZ(6)], [ZZ(4)]], + [[ZZ(6)]], + [[ZZ(8), ZZ(10), ZZ(12)], [ZZ(2), ZZ(4), ZZ(2)], [ZZ(2)]] + ] + + assert dmp_mul_ground(F_0, QQ(1, 2), 2, QQ) == [ + [[QQ(1, 14), QQ(2, 14), QQ(3, 14)], [QQ(2, 14)]], + [[QQ(3, 14)]], + [[QQ(4, 14), QQ(5, 14), QQ(6, 14)], [QQ(1, 14), QQ(2, 14), + QQ(1, 14)], [QQ(1, 14)]] + ] + + +def test_dup_quo_ground(): + raises(ZeroDivisionError, lambda: dup_quo_ground(dup_normal([1, 2, + 3], ZZ), ZZ(0), ZZ)) + + f = dup_normal([], ZZ) + + assert dup_quo_ground(f, ZZ(3), ZZ) == dup_normal([], ZZ) + + f = dup_normal([6, 2, 8], ZZ) + + assert dup_quo_ground(f, ZZ(1), ZZ) == f + assert dup_quo_ground(f, ZZ(2), ZZ) == dup_normal([3, 1, 4], ZZ) + + assert dup_quo_ground(f, ZZ(3), ZZ) == dup_normal([2, 0, 2], ZZ) + + f = dup_normal([6, 2, 8], QQ) + + assert dup_quo_ground(f, QQ(1), QQ) == f + assert dup_quo_ground(f, QQ(2), QQ) == [QQ(3), QQ(1), QQ(4)] + assert dup_quo_ground(f, QQ(7), QQ) == [QQ(6, 7), QQ(2, 7), QQ(8, 7)] + + +def test_dup_exquo_ground(): + raises(ZeroDivisionError, lambda: dup_exquo_ground(dup_normal([1, + 2, 3], ZZ), ZZ(0), ZZ)) + raises(ExactQuotientFailed, lambda: dup_exquo_ground(dup_normal([1, + 2, 3], ZZ), ZZ(3), ZZ)) + + f = dup_normal([], ZZ) + + assert dup_exquo_ground(f, ZZ(3), ZZ) == dup_normal([], ZZ) + + f = dup_normal([6, 2, 8], ZZ) + + assert dup_exquo_ground(f, ZZ(1), ZZ) == f + assert dup_exquo_ground(f, ZZ(2), ZZ) == dup_normal([3, 1, 4], ZZ) + + f = dup_normal([6, 2, 8], QQ) + + assert dup_exquo_ground(f, QQ(1), QQ) == f + assert dup_exquo_ground(f, QQ(2), QQ) == [QQ(3), QQ(1), QQ(4)] + assert dup_exquo_ground(f, QQ(7), QQ) == [QQ(6, 7), QQ(2, 7), QQ(8, 7)] + + +def test_dmp_quo_ground(): + f = dmp_normal([[6], [2], [8]], 1, ZZ) + + assert dmp_quo_ground(f, ZZ(1), 1, ZZ) == f + assert dmp_quo_ground( + f, ZZ(2), 1, ZZ) == dmp_normal([[3], [1], [4]], 1, ZZ) + + assert dmp_normal(dmp_quo_ground( + f, ZZ(3), 1, ZZ), 1, ZZ) == dmp_normal([[2], [], [2]], 1, ZZ) + + +def test_dmp_exquo_ground(): + f = dmp_normal([[6], [2], [8]], 1, ZZ) + + assert dmp_exquo_ground(f, ZZ(1), 1, ZZ) == f + assert dmp_exquo_ground( + f, ZZ(2), 1, ZZ) == dmp_normal([[3], [1], [4]], 1, ZZ) + + +def test_dup_lshift(): + assert dup_lshift([], 3, ZZ) == [] + assert dup_lshift([1], 3, ZZ) == [1, 0, 0, 0] + + +def test_dup_rshift(): + assert dup_rshift([], 3, ZZ) == [] + assert dup_rshift([1, 0, 0, 0], 3, ZZ) == [1] + + +def test_dup_abs(): + assert dup_abs([], ZZ) == [] + assert dup_abs([ZZ( 1)], ZZ) == [ZZ(1)] + assert dup_abs([ZZ(-7)], ZZ) == [ZZ(7)] + assert dup_abs([ZZ(-1), ZZ(2), ZZ(3)], ZZ) == [ZZ(1), ZZ(2), ZZ(3)] + + assert dup_abs([], QQ) == [] + assert dup_abs([QQ( 1, 2)], QQ) == [QQ(1, 2)] + assert dup_abs([QQ(-7, 3)], QQ) == [QQ(7, 3)] + assert dup_abs( + [QQ(-1, 7), QQ(2, 7), QQ(3, 7)], QQ) == [QQ(1, 7), QQ(2, 7), QQ(3, 7)] + + +def test_dmp_abs(): + assert dmp_abs([ZZ(-1)], 0, ZZ) == [ZZ(1)] + assert dmp_abs([QQ(-1, 2)], 0, QQ) == [QQ(1, 2)] + + assert dmp_abs([[[]]], 2, ZZ) == [[[]]] + assert dmp_abs([[[ZZ(1)]]], 2, ZZ) == [[[ZZ(1)]]] + assert dmp_abs([[[ZZ(-7)]]], 2, ZZ) == [[[ZZ(7)]]] + + assert dmp_abs([[[]]], 2, QQ) == [[[]]] + assert dmp_abs([[[QQ(1, 2)]]], 2, QQ) == [[[QQ(1, 2)]]] + assert dmp_abs([[[QQ(-7, 9)]]], 2, QQ) == [[[QQ(7, 9)]]] + + +def test_dup_neg(): + assert dup_neg([], ZZ) == [] + assert dup_neg([ZZ(1)], ZZ) == [ZZ(-1)] + assert dup_neg([ZZ(-7)], ZZ) == [ZZ(7)] + assert dup_neg([ZZ(-1), ZZ(2), ZZ(3)], ZZ) == [ZZ(1), ZZ(-2), ZZ(-3)] + + assert dup_neg([], QQ) == [] + assert dup_neg([QQ(1, 2)], QQ) == [QQ(-1, 2)] + assert dup_neg([QQ(-7, 9)], QQ) == [QQ(7, 9)] + assert dup_neg([QQ( + -1, 7), QQ(2, 7), QQ(3, 7)], QQ) == [QQ(1, 7), QQ(-2, 7), QQ(-3, 7)] + + +def test_dmp_neg(): + assert dmp_neg([ZZ(-1)], 0, ZZ) == [ZZ(1)] + assert dmp_neg([QQ(-1, 2)], 0, QQ) == [QQ(1, 2)] + + assert dmp_neg([[[]]], 2, ZZ) == [[[]]] + assert dmp_neg([[[ZZ(1)]]], 2, ZZ) == [[[ZZ(-1)]]] + assert dmp_neg([[[ZZ(-7)]]], 2, ZZ) == [[[ZZ(7)]]] + + assert dmp_neg([[[]]], 2, QQ) == [[[]]] + assert dmp_neg([[[QQ(1, 9)]]], 2, QQ) == [[[QQ(-1, 9)]]] + assert dmp_neg([[[QQ(-7, 9)]]], 2, QQ) == [[[QQ(7, 9)]]] + + +def test_dup_add(): + assert dup_add([], [], ZZ) == [] + assert dup_add([ZZ(1)], [], ZZ) == [ZZ(1)] + assert dup_add([], [ZZ(1)], ZZ) == [ZZ(1)] + assert dup_add([ZZ(1)], [ZZ(1)], ZZ) == [ZZ(2)] + assert dup_add([ZZ(1)], [ZZ(2)], ZZ) == [ZZ(3)] + + assert dup_add([ZZ(1), ZZ(2)], [ZZ(1)], ZZ) == [ZZ(1), ZZ(3)] + assert dup_add([ZZ(1)], [ZZ(1), ZZ(2)], ZZ) == [ZZ(1), ZZ(3)] + + assert dup_add([ZZ(1), ZZ( + 2), ZZ(3)], [ZZ(8), ZZ(9), ZZ(10)], ZZ) == [ZZ(9), ZZ(11), ZZ(13)] + + assert dup_add([], [], QQ) == [] + assert dup_add([QQ(1, 2)], [], QQ) == [QQ(1, 2)] + assert dup_add([], [QQ(1, 2)], QQ) == [QQ(1, 2)] + assert dup_add([QQ(1, 4)], [QQ(1, 4)], QQ) == [QQ(1, 2)] + assert dup_add([QQ(1, 4)], [QQ(1, 2)], QQ) == [QQ(3, 4)] + + assert dup_add([QQ(1, 2), QQ(2, 3)], [QQ(1)], QQ) == [QQ(1, 2), QQ(5, 3)] + assert dup_add([QQ(1)], [QQ(1, 2), QQ(2, 3)], QQ) == [QQ(1, 2), QQ(5, 3)] + + assert dup_add([QQ(1, 7), QQ(2, 7), QQ(3, 7)], [QQ( + 8, 7), QQ(9, 7), QQ(10, 7)], QQ) == [QQ(9, 7), QQ(11, 7), QQ(13, 7)] + + +def test_dmp_add(): + assert dmp_add([ZZ(1), ZZ(2)], [ZZ(1)], 0, ZZ) == \ + dup_add([ZZ(1), ZZ(2)], [ZZ(1)], ZZ) + assert dmp_add([QQ(1, 2), QQ(2, 3)], [QQ(1)], 0, QQ) == \ + dup_add([QQ(1, 2), QQ(2, 3)], [QQ(1)], QQ) + + assert dmp_add([[[]]], [[[]]], 2, ZZ) == [[[]]] + assert dmp_add([[[ZZ(1)]]], [[[]]], 2, ZZ) == [[[ZZ(1)]]] + assert dmp_add([[[]]], [[[ZZ(1)]]], 2, ZZ) == [[[ZZ(1)]]] + assert dmp_add([[[ZZ(2)]]], [[[ZZ(1)]]], 2, ZZ) == [[[ZZ(3)]]] + assert dmp_add([[[ZZ(1)]]], [[[ZZ(2)]]], 2, ZZ) == [[[ZZ(3)]]] + + assert dmp_add([[[]]], [[[]]], 2, QQ) == [[[]]] + assert dmp_add([[[QQ(1, 2)]]], [[[]]], 2, QQ) == [[[QQ(1, 2)]]] + assert dmp_add([[[]]], [[[QQ(1, 2)]]], 2, QQ) == [[[QQ(1, 2)]]] + assert dmp_add([[[QQ(2, 7)]]], [[[QQ(1, 7)]]], 2, QQ) == [[[QQ(3, 7)]]] + assert dmp_add([[[QQ(1, 7)]]], [[[QQ(2, 7)]]], 2, QQ) == [[[QQ(3, 7)]]] + + +def test_dup_sub(): + assert dup_sub([], [], ZZ) == [] + assert dup_sub([ZZ(1)], [], ZZ) == [ZZ(1)] + assert dup_sub([], [ZZ(1)], ZZ) == [ZZ(-1)] + assert dup_sub([ZZ(1)], [ZZ(1)], ZZ) == [] + assert dup_sub([ZZ(1)], [ZZ(2)], ZZ) == [ZZ(-1)] + + assert dup_sub([ZZ(1), ZZ(2)], [ZZ(1)], ZZ) == [ZZ(1), ZZ(1)] + assert dup_sub([ZZ(1)], [ZZ(1), ZZ(2)], ZZ) == [ZZ(-1), ZZ(-1)] + + assert dup_sub([ZZ(3), ZZ( + 2), ZZ(1)], [ZZ(8), ZZ(9), ZZ(10)], ZZ) == [ZZ(-5), ZZ(-7), ZZ(-9)] + + assert dup_sub([], [], QQ) == [] + assert dup_sub([QQ(1, 2)], [], QQ) == [QQ(1, 2)] + assert dup_sub([], [QQ(1, 2)], QQ) == [QQ(-1, 2)] + assert dup_sub([QQ(1, 3)], [QQ(1, 3)], QQ) == [] + assert dup_sub([QQ(1, 3)], [QQ(2, 3)], QQ) == [QQ(-1, 3)] + + assert dup_sub([QQ(1, 7), QQ(2, 7)], [QQ(1)], QQ) == [QQ(1, 7), QQ(-5, 7)] + assert dup_sub([QQ(1)], [QQ(1, 7), QQ(2, 7)], QQ) == [QQ(-1, 7), QQ(5, 7)] + + assert dup_sub([QQ(3, 7), QQ(2, 7), QQ(1, 7)], [QQ( + 8, 7), QQ(9, 7), QQ(10, 7)], QQ) == [QQ(-5, 7), QQ(-7, 7), QQ(-9, 7)] + + +def test_dmp_sub(): + assert dmp_sub([ZZ(1), ZZ(2)], [ZZ(1)], 0, ZZ) == \ + dup_sub([ZZ(1), ZZ(2)], [ZZ(1)], ZZ) + assert dmp_sub([QQ(1, 2), QQ(2, 3)], [QQ(1)], 0, QQ) == \ + dup_sub([QQ(1, 2), QQ(2, 3)], [QQ(1)], QQ) + + assert dmp_sub([[[]]], [[[]]], 2, ZZ) == [[[]]] + assert dmp_sub([[[ZZ(1)]]], [[[]]], 2, ZZ) == [[[ZZ(1)]]] + assert dmp_sub([[[]]], [[[ZZ(1)]]], 2, ZZ) == [[[ZZ(-1)]]] + assert dmp_sub([[[ZZ(2)]]], [[[ZZ(1)]]], 2, ZZ) == [[[ZZ(1)]]] + assert dmp_sub([[[ZZ(1)]]], [[[ZZ(2)]]], 2, ZZ) == [[[ZZ(-1)]]] + + assert dmp_sub([[[]]], [[[]]], 2, QQ) == [[[]]] + assert dmp_sub([[[QQ(1, 2)]]], [[[]]], 2, QQ) == [[[QQ(1, 2)]]] + assert dmp_sub([[[]]], [[[QQ(1, 2)]]], 2, QQ) == [[[QQ(-1, 2)]]] + assert dmp_sub([[[QQ(2, 7)]]], [[[QQ(1, 7)]]], 2, QQ) == [[[QQ(1, 7)]]] + assert dmp_sub([[[QQ(1, 7)]]], [[[QQ(2, 7)]]], 2, QQ) == [[[QQ(-1, 7)]]] + + +def test_dup_add_mul(): + assert dup_add_mul([ZZ(1), ZZ(2), ZZ(3)], [ZZ(3), ZZ(2), ZZ(1)], + [ZZ(1), ZZ(2)], ZZ) == [ZZ(3), ZZ(9), ZZ(7), ZZ(5)] + assert dmp_add_mul([[ZZ(1), ZZ(2)], [ZZ(3)]], [[ZZ(3)], [ZZ(2), ZZ(1)]], + [[ZZ(1)], [ZZ(2)]], 1, ZZ) == [[ZZ(3)], [ZZ(3), ZZ(9)], [ZZ(4), ZZ(5)]] + + +def test_dup_sub_mul(): + assert dup_sub_mul([ZZ(1), ZZ(2), ZZ(3)], [ZZ(3), ZZ(2), ZZ(1)], + [ZZ(1), ZZ(2)], ZZ) == [ZZ(-3), ZZ(-7), ZZ(-3), ZZ(1)] + assert dmp_sub_mul([[ZZ(1), ZZ(2)], [ZZ(3)]], [[ZZ(3)], [ZZ(2), ZZ(1)]], + [[ZZ(1)], [ZZ(2)]], 1, ZZ) == [[ZZ(-3)], [ZZ(-1), ZZ(-5)], [ZZ(-4), ZZ(1)]] + + +def test_dup_mul(): + assert dup_mul([], [], ZZ) == [] + assert dup_mul([], [ZZ(1)], ZZ) == [] + assert dup_mul([ZZ(1)], [], ZZ) == [] + assert dup_mul([ZZ(1)], [ZZ(1)], ZZ) == [ZZ(1)] + assert dup_mul([ZZ(5)], [ZZ(7)], ZZ) == [ZZ(35)] + + assert dup_mul([], [], QQ) == [] + assert dup_mul([], [QQ(1, 2)], QQ) == [] + assert dup_mul([QQ(1, 2)], [], QQ) == [] + assert dup_mul([QQ(1, 2)], [QQ(4, 7)], QQ) == [QQ(2, 7)] + assert dup_mul([QQ(5, 7)], [QQ(3, 7)], QQ) == [QQ(15, 49)] + + f = dup_normal([3, 0, 0, 6, 1, 2], ZZ) + g = dup_normal([4, 0, 1, 0], ZZ) + h = dup_normal([12, 0, 3, 24, 4, 14, 1, 2, 0], ZZ) + + assert dup_mul(f, g, ZZ) == h + assert dup_mul(g, f, ZZ) == h + + f = dup_normal([2, 0, 0, 1, 7], ZZ) + h = dup_normal([4, 0, 0, 4, 28, 0, 1, 14, 49], ZZ) + + assert dup_mul(f, f, ZZ) == h + + K = FF(6) + + assert dup_mul([K(2), K(1)], [K(3), K(4)], K) == [K(5), K(4)] + + p1 = dup_normal([79, -1, 78, -94, -10, 11, 32, -19, 78, 2, -89, 30, 73, 42, + 85, 77, 83, -30, -34, -2, 95, -81, 37, -49, -46, -58, -16, 37, 35, -11, + -57, -15, -31, 67, -20, 27, 76, 2, 70, 67, -65, 65, -26, -93, -44, -12, + -92, 57, -90, -57, -11, -67, -98, -69, 97, -41, 89, 33, 89, -50, 81, + -31, 60, -27, 43, 29, -77, 44, 21, -91, 32, -57, 33, 3, 53, -51, -38, + -99, -84, 23, -50, 66, -100, 1, -75, -25, 27, -60, 98, -51, -87, 6, 8, + 78, -28, -95, -88, 12, -35, 26, -9, 16, -92, 55, -7, -86, 68, -39, -46, + 84, 94, 45, 60, 92, 68, -75, -74, -19, 8, 75, 78, 91, 57, 34, 14, -3, + -49, 65, 78, -18, 6, -29, -80, -98, 17, 13, 58, 21, 20, 9, 37, 7, -30, + -53, -20, 34, 67, -42, 89, -22, 73, 43, -6, 5, 51, -8, -15, -52, -22, + -58, -72, -3, 43, -92, 82, 83, -2, -13, -23, -60, 16, -94, -8, -28, + -95, -72, 63, -90, 76, 6, -43, -100, -59, 76, 3, 3, 46, -85, 75, 62, + -71, -76, 88, 97, -72, -1, 30, -64, 72, -48, 14, -78, 58, 63, -91, 24, + -87, -27, -80, -100, -44, 98, 70, 100, -29, -38, 11, 77, 100, 52, 86, + 65, -5, -42, -81, -38, -42, 43, -2, -70, -63, -52], ZZ) + p2 = dup_normal([65, -19, -47, 1, 90, 81, -15, -34, 25, -75, 9, -83, 50, -5, + -44, 31, 1, 70, -7, 78, 74, 80, 85, 65, 21, 41, 66, 19, -40, 63, -21, + -27, 32, 69, 83, 34, -35, 14, 81, 57, -75, 32, -67, -89, -100, -61, 46, + 84, -78, -29, -50, -94, -24, -32, -68, -16, 100, -7, -72, -89, 35, 82, + 58, 81, -92, 62, 5, -47, -39, -58, -72, -13, 84, 44, 55, -25, 48, -54, + -31, -56, -11, -50, -84, 10, 67, 17, 13, -14, 61, 76, -64, -44, -40, + -96, 11, -11, -94, 2, 6, 27, -6, 68, -54, 66, -74, -14, -1, -24, -73, + 96, 89, -11, -89, 56, -53, 72, -43, 96, 25, 63, -31, 29, 68, 83, 91, + -93, -19, -38, -40, 40, -12, -19, -79, 44, 100, -66, -29, -77, 62, 39, + -8, 11, -97, 14, 87, 64, 21, -18, 13, 15, -59, -75, -99, -88, 57, 54, + 56, -67, 6, -63, -59, -14, 28, 87, -20, -39, 84, -91, -2, 49, -75, 11, + -24, -95, 36, 66, 5, 25, -72, -40, 86, 90, 37, -33, 57, -35, 29, -18, + 4, -79, 64, -17, -27, 21, 29, -5, -44, -87, -24, 52, 78, 11, -23, -53, + 36, 42, 21, -68, 94, -91, -51, -21, 51, -76, 72, 31, 24, -48, -80, -9, + 37, -47, -6, -8, -63, -91, 79, -79, -100, 38, -20, 38, 100, 83, -90, + 87, 63, -36, 82, -19, 18, -98, -38, 26, 98, -70, 79, 92, 12, 12, 70, + 74, 36, 48, -13, 31, 31, -47, -71, -12, -64, 36, -42, 32, -86, 60, 83, + 70, 55, 0, 1, 29, -35, 8, -82, 8, -73, -46, -50, 43, 48, -5, -86, -72, + 44, -90, 19, 19, 5, -20, 97, -13, -66, -5, 5, -69, 64, -30, 41, 51, 36, + 13, -99, -61, 94, -12, 74, 98, 68, 24, 46, -97, -87, -6, -27, 82, 62, + -11, -77, 86, 66, -47, -49, -50, 13, 18, 89, -89, 46, -80, 13, 98, -35, + -36, -25, 12, 20, 26, -52, 79, 27, 79, 100, 8, 62, -58, -28, 37], ZZ) + res = dup_normal([5135, -1566, 1376, -7466, 4579, 11710, 8001, -7183, + -3737, -7439, 345, -10084, 24522, -1201, 1070, -10245, 9582, 9264, + 1903, 23312, 18953, 10037, -15268, -5450, 6442, -6243, -3777, 5110, + 10936, -16649, -6022, 16255, 31300, 24818, 31922, 32760, 7854, 27080, + 15766, 29596, 7139, 31945, -19810, 465, -38026, -3971, 9641, 465, + -19375, 5524, -30112, -11960, -12813, 13535, 30670, 5925, -43725, + -14089, 11503, -22782, 6371, 43881, 37465, -33529, -33590, -39798, + -37854, -18466, -7908, -35825, -26020, -36923, -11332, -5699, 25166, + -3147, 19885, 12962, -20659, -1642, 27723, -56331, -24580, -11010, + -20206, 20087, -23772, -16038, 38580, 20901, -50731, 32037, -4299, + 26508, 18038, -28357, 31846, -7405, -20172, -15894, 2096, 25110, + -45786, 45918, -55333, -31928, -49428, -29824, -58796, -24609, -15408, + 69, -35415, -18439, 10123, -20360, -65949, 33356, -20333, 26476, + -32073, 33621, 930, 28803, -42791, 44716, 38164, 12302, -1739, 11421, + 73385, -7613, 14297, 38155, -414, 77587, 24338, -21415, 29367, 42639, + 13901, -288, 51027, -11827, 91260, 43407, 88521, -15186, 70572, -12049, + 5090, -12208, -56374, 15520, -623, -7742, 50825, 11199, -14894, 40892, + 59591, -31356, -28696, -57842, -87751, -33744, -28436, -28945, -40287, + 37957, -35638, 33401, -61534, 14870, 40292, 70366, -10803, 102290, + -71719, -85251, 7902, -22409, 75009, 99927, 35298, -1175, -762, -34744, + -10587, -47574, -62629, -19581, -43659, -54369, -32250, -39545, 15225, + -24454, 11241, -67308, -30148, 39929, 37639, 14383, -73475, -77636, + -81048, -35992, 41601, -90143, 76937, -8112, 56588, 9124, -40094, + -32340, 13253, 10898, -51639, 36390, 12086, -1885, 100714, -28561, + -23784, -18735, 18916, 16286, 10742, -87360, -13697, 10689, -19477, + -29770, 5060, 20189, -8297, 112407, 47071, 47743, 45519, -4109, 17468, + -68831, 78325, -6481, -21641, -19459, 30919, 96115, 8607, 53341, 32105, + -16211, 23538, 57259, -76272, -40583, 62093, 38511, -34255, -40665, + -40604, -37606, -15274, 33156, -13885, 103636, 118678, -14101, -92682, + -100791, 2634, 63791, 98266, 19286, -34590, -21067, -71130, 25380, + -40839, -27614, -26060, 52358, -15537, 27138, -6749, 36269, -33306, + 13207, -91084, -5540, -57116, 69548, 44169, -57742, -41234, -103327, + -62904, -8566, 41149, -12866, 71188, 23980, 1838, 58230, 73950, 5594, + 43113, -8159, -15925, 6911, 85598, -75016, -16214, -62726, -39016, + 8618, -63882, -4299, 23182, 49959, 49342, -3238, -24913, -37138, 78361, + 32451, 6337, -11438, -36241, -37737, 8169, -3077, -24829, 57953, 53016, + -31511, -91168, 12599, -41849, 41576, 55275, -62539, 47814, -62319, + 12300, -32076, -55137, -84881, -27546, 4312, -3433, -54382, 113288, + -30157, 74469, 18219, 79880, -2124, 98911, 17655, -33499, -32861, + 47242, -37393, 99765, 14831, -44483, 10800, -31617, -52710, 37406, + 22105, 29704, -20050, 13778, 43683, 36628, 8494, 60964, -22644, 31550, + -17693, 33805, -124879, -12302, 19343, 20400, -30937, -21574, -34037, + -33380, 56539, -24993, -75513, -1527, 53563, 65407, -101, 53577, 37991, + 18717, -23795, -8090, -47987, -94717, 41967, 5170, -14815, -94311, + 17896, -17734, -57718, -774, -38410, 24830, 29682, 76480, 58802, + -46416, -20348, -61353, -68225, -68306, 23822, -31598, 42972, 36327, + 28968, -65638, -21638, 24354, -8356, 26777, 52982, -11783, -44051, + -26467, -44721, -28435, -53265, -25574, -2669, 44155, 22946, -18454, + -30718, -11252, 58420, 8711, 67447, 4425, 41749, 67543, 43162, 11793, + -41907, 20477, -13080, 6559, -6104, -13244, 42853, 42935, 29793, 36730, + -28087, 28657, 17946, 7503, 7204, 21491, -27450, -24241, -98156, + -18082, -42613, -24928, 10775, -14842, -44127, 55910, 14777, 31151, -2194, + 39206, -2100, -4211, 11827, -8918, -19471, 72567, 36447, -65590, -34861, + -17147, -45303, 9025, -7333, -35473, 11101, 11638, 3441, 6626, -41800, + 9416, 13679, 33508, 40502, -60542, 16358, 8392, -43242, -35864, -34127, + -48721, 35878, 30598, 28630, 20279, -19983, -14638, -24455, -1851, -11344, + 45150, 42051, 26034, -28889, -32382, -3527, -14532, 22564, -22346, 477, + 11706, 28338, -25972, -9185, -22867, -12522, 32120, -4424, 11339, -33913, + -7184, 5101, -23552, -17115, -31401, -6104, 21906, 25708, 8406, 6317, + -7525, 5014, 20750, 20179, 22724, 11692, 13297, 2493, -253, -16841, -17339, + -6753, -4808, 2976, -10881, -10228, -13816, -12686, 1385, 2316, 2190, -875, + -1924], ZZ) + + assert dup_mul(p1, p2, ZZ) == res + + p1 = dup_normal([83, -61, -86, -24, 12, 43, -88, -9, 42, 55, -66, 74, 95, + -25, -12, 68, -99, 4, 45, 6, -15, -19, 78, 65, -55, 47, -13, 17, 86, + 81, -58, -27, 50, -40, -24, 39, -41, -92, 75, 90, -1, 40, -15, -27, + -35, 68, 70, -64, -40, 78, -88, -58, -39, 69, 46, 12, 28, -94, -37, + -50, -80, -96, -61, 25, 1, 71, 4, 12, 48, 4, 34, -47, -75, 5, 48, 82, + 88, 23, 98, 35, 17, -10, 48, -61, -95, 47, 65, -19, -66, -57, -6, -51, + -42, -89, 66, -13, 18, 37, 90, -23, 72, 96, -53, 0, 40, -73, -52, -68, + 32, -25, -53, 79, -52, 18, 44, 73, -81, 31, -90, 70, 3, 36, 48, 76, + -24, -44, 23, 98, -4, 73, 69, 88, -70, 14, -68, 94, -78, -15, -64, -97, + -70, -35, 65, 88, 49, -53, -7, 12, -45, -7, 59, -94, 99, -2, 67, -60, + -71, 29, -62, -77, 1, 51, 17, 80, -20, -47, -19, 24, -9, 39, -23, 21, + -84, 10, 84, 56, -17, -21, -66, 85, 70, 46, -51, -22, -95, 78, -60, + -96, -97, -45, 72, 35, 30, -61, -92, -93, -60, -61, 4, -4, -81, -73, + 46, 53, -11, 26, 94, 45, 14, -78, 55, 84, -68, 98, 60, 23, 100, -63, + 68, 96, -16, 3, 56, 21, -58, 62, -67, 66, 85, 41, -79, -22, 97, -67, + 82, 82, -96, -20, -7, 48, -67, 48, -9, -39, 78], ZZ) + p2 = dup_normal([52, 88, 76, 66, 9, -64, 46, -20, -28, 69, 60, 96, -36, + -92, -30, -11, -35, 35, 55, 63, -92, -7, 25, -58, 74, 55, -6, 4, 47, + -92, -65, 67, -45, 74, -76, 59, -6, 69, 39, 24, -71, -7, 39, -45, 60, + -68, 98, 97, -79, 17, 4, 94, -64, 68, -100, -96, -2, 3, 22, 96, 54, + -77, -86, 67, 6, 57, 37, 40, 89, -78, 64, -94, -45, -92, 57, 87, -26, + 36, 19, 97, 25, 77, -87, 24, 43, -5, 35, 57, 83, 71, 35, 63, 61, 96, + -22, 8, -1, 96, 43, 45, 94, -93, 36, 71, -41, -99, 85, -48, 59, 52, + -17, 5, 87, -16, -68, -54, 76, -18, 100, 91, -42, -70, -66, -88, -12, + 1, 95, -82, 52, 43, -29, 3, 12, 72, -99, -43, -32, -93, -51, 16, -20, + -12, -11, 5, 33, -38, 93, -5, -74, 25, 74, -58, 93, 59, -63, -86, 63, + -20, -4, -74, -73, -95, 29, -28, 93, -91, -2, -38, -62, 77, -58, -85, + -28, 95, 38, 19, -69, 86, 94, 25, -2, -4, 47, 34, -59, 35, -48, 29, + -63, -53, 34, 29, 66, 73, 6, 92, -84, 89, 15, 81, 93, 97, 51, -72, -78, + 25, 60, 90, -45, 39, 67, -84, -62, 57, 26, -32, -56, -14, -83, 76, 5, + -2, 99, -100, 28, 46, 94, -7, 53, -25, 16, -23, -36, 89, -78, -63, 31, + 1, 84, -99, -52, 76, 48, 90, -76, 44, -19, 54, -36, -9, -73, -100, -69, + 31, 42, 25, -39, 76, -26, -8, -14, 51, 3, 37, 45, 2, -54, 13, -34, -92, + 17, -25, -65, 53, -63, 30, 4, -70, -67, 90, 52, 51, 18, -3, 31, -45, + -9, 59, 63, -87, 22, -32, 29, -38, 21, 36, -82, 27, -11], ZZ) + res = dup_normal([4316, 4132, -3532, -7974, -11303, -10069, 5484, -3330, + -5874, 7734, 4673, 11327, -9884, -8031, 17343, 21035, -10570, -9285, + 15893, 3780, -14083, 8819, 17592, 10159, 7174, -11587, 8598, -16479, + 3602, 25596, 9781, 12163, 150, 18749, -21782, -12307, 27578, -2757, + -12573, 12565, 6345, -18956, 19503, -15617, 1443, -16778, 36851, 23588, + -28474, 5749, 40695, -7521, -53669, -2497, -18530, 6770, 57038, 3926, + -6927, -15399, 1848, -64649, -27728, 3644, 49608, 15187, -8902, -9480, + -7398, -40425, 4824, 23767, -7594, -6905, 33089, 18786, 12192, 24670, + 31114, 35334, -4501, -14676, 7107, -59018, -21352, 20777, 19661, 20653, + 33754, -885, -43758, 6269, 51897, -28719, -97488, -9527, 13746, 11644, + 17644, -21720, 23782, -10481, 47867, 20752, 33810, -1875, 39918, -7710, + -40840, 19808, -47075, 23066, 46616, 25201, 9287, 35436, -1602, 9645, + -11978, 13273, 15544, 33465, 20063, 44539, 11687, 27314, -6538, -37467, + 14031, 32970, -27086, 41323, 29551, 65910, -39027, -37800, -22232, + 8212, 46316, -28981, -55282, 50417, -44929, -44062, 73879, 37573, + -2596, -10877, -21893, -133218, -33707, -25753, -9531, 17530, 61126, + 2748, -56235, 43874, -10872, -90459, -30387, 115267, -7264, -44452, + 122626, 14839, -599, 10337, 57166, -67467, -54957, 63669, 1202, 18488, + 52594, 7205, -97822, 612, 78069, -5403, -63562, 47236, 36873, -154827, + -26188, 82427, -39521, 5628, 7416, 5276, -53095, 47050, 26121, -42207, + 79021, -13035, 2499, -66943, 29040, -72355, -23480, 23416, -12885, + -44225, -42688, -4224, 19858, 55299, 15735, 11465, 101876, -39169, + 51786, 14723, 43280, -68697, 16410, 92295, 56767, 7183, 111850, 4550, + 115451, -38443, -19642, -35058, 10230, 93829, 8925, 63047, 3146, 29250, + 8530, 5255, -98117, -115517, -76817, -8724, 41044, 1312, -35974, 79333, + -28567, 7547, -10580, -24559, -16238, 10794, -3867, 24848, 57770, + -51536, -35040, 71033, 29853, 62029, -7125, -125585, -32169, -47907, + 156811, -65176, -58006, -15757, -57861, 11963, 30225, -41901, -41681, + 31310, 27982, 18613, 61760, 60746, -59096, 33499, 30097, -17997, 24032, + 56442, -83042, 23747, -20931, -21978, -158752, -9883, -73598, -7987, + -7333, -125403, -116329, 30585, 53281, 51018, -29193, 88575, 8264, + -40147, -16289, 113088, 12810, -6508, 101552, -13037, 34440, -41840, + 101643, 24263, 80532, 61748, 65574, 6423, -20672, 6591, -10834, -71716, + 86919, -92626, 39161, 28490, 81319, 46676, 106720, 43530, 26998, 57456, + -8862, 60989, 13982, 3119, -2224, 14743, 55415, -49093, -29303, 28999, + 1789, 55953, -84043, -7780, -65013, 57129, -47251, 61484, 61994, + -78361, -82778, 22487, -26894, 9756, -74637, -15519, -4360, 30115, + 42433, 35475, 15286, 69768, 21509, -20214, 78675, -21163, 13596, 11443, + -10698, -53621, -53867, -24155, 64500, -42784, -33077, -16500, 873, + -52788, 14546, -38011, 36974, -39849, -34029, -94311, 83068, -50437, + -26169, -46746, 59185, 42259, -101379, -12943, 30089, -59086, 36271, + 22723, -30253, -52472, -70826, -23289, 3331, -31687, 14183, -857, + -28627, 35246, -51284, 5636, -6933, 66539, 36654, 50927, 24783, 3457, + 33276, 45281, 45650, -4938, -9968, -22590, 47995, 69229, 5214, -58365, + -17907, -14651, 18668, 18009, 12649, -11851, -13387, 20339, 52472, + -1087, -21458, -68647, 52295, 15849, 40608, 15323, 25164, -29368, + 10352, -7055, 7159, 21695, -5373, -54849, 101103, -24963, -10511, + 33227, 7659, 41042, -69588, 26718, -20515, 6441, 38135, -63, 24088, + -35364, -12785, -18709, 47843, 48533, -48575, 17251, -19394, 32878, + -9010, -9050, 504, -12407, 28076, -3429, 25324, -4210, -26119, 752, + -29203, 28251, -11324, -32140, -3366, -25135, 18702, -31588, -7047, + -24267, 49987, -14975, -33169, 37744, -7720, -9035, 16964, -2807, -421, + 14114, -17097, -13662, 40628, -12139, -9427, 5369, 17551, -13232, -16211, + 9804, -7422, 2677, 28635, -8280, -4906, 2908, -22558, 5604, 12459, 8756, + -3980, -4745, -18525, 7913, 5970, -16457, 20230, -6247, -13812, 2505, + 11899, 1409, -15094, 22540, -18863, 137, 11123, -4516, 2290, -8594, 12150, + -10380, 3005, 5235, -7350, 2535, -858], ZZ) + + assert dup_mul(p1, p2, ZZ) == res + + +def test_dmp_mul(): + assert dmp_mul([ZZ(5)], [ZZ(7)], 0, ZZ) == \ + dup_mul([ZZ(5)], [ZZ(7)], ZZ) + assert dmp_mul([QQ(5, 7)], [QQ(3, 7)], 0, QQ) == \ + dup_mul([QQ(5, 7)], [QQ(3, 7)], QQ) + + assert dmp_mul([[[]]], [[[]]], 2, ZZ) == [[[]]] + assert dmp_mul([[[ZZ(1)]]], [[[]]], 2, ZZ) == [[[]]] + assert dmp_mul([[[]]], [[[ZZ(1)]]], 2, ZZ) == [[[]]] + assert dmp_mul([[[ZZ(2)]]], [[[ZZ(1)]]], 2, ZZ) == [[[ZZ(2)]]] + assert dmp_mul([[[ZZ(1)]]], [[[ZZ(2)]]], 2, ZZ) == [[[ZZ(2)]]] + + assert dmp_mul([[[]]], [[[]]], 2, QQ) == [[[]]] + assert dmp_mul([[[QQ(1, 2)]]], [[[]]], 2, QQ) == [[[]]] + assert dmp_mul([[[]]], [[[QQ(1, 2)]]], 2, QQ) == [[[]]] + assert dmp_mul([[[QQ(2, 7)]]], [[[QQ(1, 3)]]], 2, QQ) == [[[QQ(2, 21)]]] + assert dmp_mul([[[QQ(1, 7)]]], [[[QQ(2, 3)]]], 2, QQ) == [[[QQ(2, 21)]]] + + K = FF(6) + + assert dmp_mul( + [[K(2)], [K(1)]], [[K(3)], [K(4)]], 1, K) == [[K(5)], [K(4)]] + + +def test_dup_sqr(): + assert dup_sqr([], ZZ) == [] + assert dup_sqr([ZZ(2)], ZZ) == [ZZ(4)] + assert dup_sqr([ZZ(1), ZZ(2)], ZZ) == [ZZ(1), ZZ(4), ZZ(4)] + + assert dup_sqr([], QQ) == [] + assert dup_sqr([QQ(2, 3)], QQ) == [QQ(4, 9)] + assert dup_sqr([QQ(1, 3), QQ(2, 3)], QQ) == [QQ(1, 9), QQ(4, 9), QQ(4, 9)] + + f = dup_normal([2, 0, 0, 1, 7], ZZ) + + assert dup_sqr(f, ZZ) == dup_normal([4, 0, 0, 4, 28, 0, 1, 14, 49], ZZ) + + K = FF(9) + + assert dup_sqr([K(3), K(4)], K) == [K(6), K(7)] + + +def test_dmp_sqr(): + assert dmp_sqr([ZZ(1), ZZ(2)], 0, ZZ) == \ + dup_sqr([ZZ(1), ZZ(2)], ZZ) + + assert dmp_sqr([[[]]], 2, ZZ) == [[[]]] + assert dmp_sqr([[[ZZ(2)]]], 2, ZZ) == [[[ZZ(4)]]] + + assert dmp_sqr([[[]]], 2, QQ) == [[[]]] + assert dmp_sqr([[[QQ(2, 3)]]], 2, QQ) == [[[QQ(4, 9)]]] + + K = FF(9) + + assert dmp_sqr([[K(3)], [K(4)]], 1, K) == [[K(6)], [K(7)]] + + +def test_dup_pow(): + assert dup_pow([], 0, ZZ) == [ZZ(1)] + assert dup_pow([], 0, QQ) == [QQ(1)] + + assert dup_pow([], 1, ZZ) == [] + assert dup_pow([], 7, ZZ) == [] + + assert dup_pow([ZZ(1)], 0, ZZ) == [ZZ(1)] + assert dup_pow([ZZ(1)], 1, ZZ) == [ZZ(1)] + assert dup_pow([ZZ(1)], 7, ZZ) == [ZZ(1)] + + assert dup_pow([ZZ(3)], 0, ZZ) == [ZZ(1)] + assert dup_pow([ZZ(3)], 1, ZZ) == [ZZ(3)] + assert dup_pow([ZZ(3)], 7, ZZ) == [ZZ(2187)] + + assert dup_pow([QQ(1, 1)], 0, QQ) == [QQ(1, 1)] + assert dup_pow([QQ(1, 1)], 1, QQ) == [QQ(1, 1)] + assert dup_pow([QQ(1, 1)], 7, QQ) == [QQ(1, 1)] + + assert dup_pow([QQ(3, 7)], 0, QQ) == [QQ(1, 1)] + assert dup_pow([QQ(3, 7)], 1, QQ) == [QQ(3, 7)] + assert dup_pow([QQ(3, 7)], 7, QQ) == [QQ(2187, 823543)] + + f = dup_normal([2, 0, 0, 1, 7], ZZ) + + assert dup_pow(f, 0, ZZ) == dup_normal([1], ZZ) + assert dup_pow(f, 1, ZZ) == dup_normal([2, 0, 0, 1, 7], ZZ) + assert dup_pow(f, 2, ZZ) == dup_normal([4, 0, 0, 4, 28, 0, 1, 14, 49], ZZ) + assert dup_pow(f, 3, ZZ) == dup_normal( + [8, 0, 0, 12, 84, 0, 6, 84, 294, 1, 21, 147, 343], ZZ) + + +def test_dmp_pow(): + assert dmp_pow([[]], 0, 1, ZZ) == [[ZZ(1)]] + assert dmp_pow([[]], 0, 1, QQ) == [[QQ(1)]] + + assert dmp_pow([[]], 1, 1, ZZ) == [[]] + assert dmp_pow([[]], 7, 1, ZZ) == [[]] + + assert dmp_pow([[ZZ(1)]], 0, 1, ZZ) == [[ZZ(1)]] + assert dmp_pow([[ZZ(1)]], 1, 1, ZZ) == [[ZZ(1)]] + assert dmp_pow([[ZZ(1)]], 7, 1, ZZ) == [[ZZ(1)]] + + assert dmp_pow([[QQ(3, 7)]], 0, 1, QQ) == [[QQ(1, 1)]] + assert dmp_pow([[QQ(3, 7)]], 1, 1, QQ) == [[QQ(3, 7)]] + assert dmp_pow([[QQ(3, 7)]], 7, 1, QQ) == [[QQ(2187, 823543)]] + + f = dup_normal([2, 0, 0, 1, 7], ZZ) + + assert dmp_pow(f, 2, 0, ZZ) == dup_pow(f, 2, ZZ) + + +def test_dup_pdiv(): + f = dup_normal([3, 1, 1, 5], ZZ) + g = dup_normal([5, -3, 1], ZZ) + + q = dup_normal([15, 14], ZZ) + r = dup_normal([52, 111], ZZ) + + assert dup_pdiv(f, g, ZZ) == (q, r) + assert dup_pquo(f, g, ZZ) == q + assert dup_prem(f, g, ZZ) == r + + raises(ExactQuotientFailed, lambda: dup_pexquo(f, g, ZZ)) + + f = dup_normal([3, 1, 1, 5], QQ) + g = dup_normal([5, -3, 1], QQ) + + q = dup_normal([15, 14], QQ) + r = dup_normal([52, 111], QQ) + + assert dup_pdiv(f, g, QQ) == (q, r) + assert dup_pquo(f, g, QQ) == q + assert dup_prem(f, g, QQ) == r + + raises(ExactQuotientFailed, lambda: dup_pexquo(f, g, QQ)) + + +def test_dmp_pdiv(): + f = dmp_normal([[1], [], [1, 0, 0]], 1, ZZ) + g = dmp_normal([[1], [-1, 0]], 1, ZZ) + + q = dmp_normal([[1], [1, 0]], 1, ZZ) + r = dmp_normal([[2, 0, 0]], 1, ZZ) + + assert dmp_pdiv(f, g, 1, ZZ) == (q, r) + assert dmp_pquo(f, g, 1, ZZ) == q + assert dmp_prem(f, g, 1, ZZ) == r + + raises(ExactQuotientFailed, lambda: dmp_pexquo(f, g, 1, ZZ)) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, ZZ) + g = dmp_normal([[2], [-2, 0]], 1, ZZ) + + q = dmp_normal([[2], [2, 0]], 1, ZZ) + r = dmp_normal([[8, 0, 0]], 1, ZZ) + + assert dmp_pdiv(f, g, 1, ZZ) == (q, r) + assert dmp_pquo(f, g, 1, ZZ) == q + assert dmp_prem(f, g, 1, ZZ) == r + + raises(ExactQuotientFailed, lambda: dmp_pexquo(f, g, 1, ZZ)) + + +def test_dup_rr_div(): + raises(ZeroDivisionError, lambda: dup_rr_div([1, 2, 3], [], ZZ)) + + f = dup_normal([3, 1, 1, 5], ZZ) + g = dup_normal([5, -3, 1], ZZ) + + q, r = [], f + + assert dup_rr_div(f, g, ZZ) == (q, r) + + +def test_dmp_rr_div(): + raises(ZeroDivisionError, lambda: dmp_rr_div([[1, 2], [3]], [[]], 1, ZZ)) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, ZZ) + g = dmp_normal([[1], [-1, 0]], 1, ZZ) + + q = dmp_normal([[1], [1, 0]], 1, ZZ) + r = dmp_normal([[2, 0, 0]], 1, ZZ) + + assert dmp_rr_div(f, g, 1, ZZ) == (q, r) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, ZZ) + g = dmp_normal([[-1], [1, 0]], 1, ZZ) + + q = dmp_normal([[-1], [-1, 0]], 1, ZZ) + r = dmp_normal([[2, 0, 0]], 1, ZZ) + + assert dmp_rr_div(f, g, 1, ZZ) == (q, r) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, ZZ) + g = dmp_normal([[2], [-2, 0]], 1, ZZ) + + q, r = [[]], f + + assert dmp_rr_div(f, g, 1, ZZ) == (q, r) + + +def test_dup_ff_div(): + raises(ZeroDivisionError, lambda: dup_ff_div([1, 2, 3], [], QQ)) + + f = dup_normal([3, 1, 1, 5], QQ) + g = dup_normal([5, -3, 1], QQ) + + q = [QQ(3, 5), QQ(14, 25)] + r = [QQ(52, 25), QQ(111, 25)] + + assert dup_ff_div(f, g, QQ) == (q, r) + +def test_dup_ff_div_gmpy2(): + if GROUND_TYPES != 'gmpy2': + return + + from gmpy2 import mpq + from sympy.polys.domains import GMPYRationalField + K = GMPYRationalField() + + f = [mpq(1,3), mpq(3,2)] + g = [mpq(2,1)] + assert dmp_ff_div(f, g, 0, K) == ([mpq(1,6), mpq(3,4)], []) + + f = [mpq(1,2), mpq(1,3), mpq(1,4), mpq(1,5)] + g = [mpq(-1,1), mpq(1,1), mpq(-1,1)] + assert dmp_ff_div(f, g, 0, K) == ([mpq(-1,2), mpq(-5,6)], [mpq(7,12), mpq(-19,30)]) + +def test_dmp_ff_div(): + raises(ZeroDivisionError, lambda: dmp_ff_div([[1, 2], [3]], [[]], 1, QQ)) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, QQ) + g = dmp_normal([[1], [-1, 0]], 1, QQ) + + q = [[QQ(1, 1)], [QQ(1, 1), QQ(0, 1)]] + r = [[QQ(2, 1), QQ(0, 1), QQ(0, 1)]] + + assert dmp_ff_div(f, g, 1, QQ) == (q, r) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, QQ) + g = dmp_normal([[-1], [1, 0]], 1, QQ) + + q = [[QQ(-1, 1)], [QQ(-1, 1), QQ(0, 1)]] + r = [[QQ(2, 1), QQ(0, 1), QQ(0, 1)]] + + assert dmp_ff_div(f, g, 1, QQ) == (q, r) + + f = dmp_normal([[1], [], [1, 0, 0]], 1, QQ) + g = dmp_normal([[2], [-2, 0]], 1, QQ) + + q = [[QQ(1, 2)], [QQ(1, 2), QQ(0, 1)]] + r = [[QQ(2, 1), QQ(0, 1), QQ(0, 1)]] + + assert dmp_ff_div(f, g, 1, QQ) == (q, r) + + +def test_dup_div(): + f, g, q, r = [5, 4, 3, 2, 1], [1, 2, 3], [5, -6, 0], [20, 1] + + assert dup_div(f, g, ZZ) == (q, r) + assert dup_quo(f, g, ZZ) == q + assert dup_rem(f, g, ZZ) == r + + raises(ExactQuotientFailed, lambda: dup_exquo(f, g, ZZ)) + + f, g, q, r = [5, 4, 3, 2, 1, 0], [1, 2, 0, 0, 9], [5, -6], [15, 2, -44, 54] + + assert dup_div(f, g, ZZ) == (q, r) + assert dup_quo(f, g, ZZ) == q + assert dup_rem(f, g, ZZ) == r + + raises(ExactQuotientFailed, lambda: dup_exquo(f, g, ZZ)) + + +def test_dmp_div(): + f, g, q, r = [5, 4, 3, 2, 1], [1, 2, 3], [5, -6, 0], [20, 1] + + assert dmp_div(f, g, 0, ZZ) == (q, r) + assert dmp_quo(f, g, 0, ZZ) == q + assert dmp_rem(f, g, 0, ZZ) == r + + raises(ExactQuotientFailed, lambda: dmp_exquo(f, g, 0, ZZ)) + + f, g, q, r = [[[1]]], [[[2]], [1]], [[[]]], [[[1]]] + + assert dmp_div(f, g, 2, ZZ) == (q, r) + assert dmp_quo(f, g, 2, ZZ) == q + assert dmp_rem(f, g, 2, ZZ) == r + + raises(ExactQuotientFailed, lambda: dmp_exquo(f, g, 2, ZZ)) + + +def test_dup_max_norm(): + assert dup_max_norm([], ZZ) == 0 + assert dup_max_norm([1], ZZ) == 1 + + assert dup_max_norm([1, 4, 2, 3], ZZ) == 4 + + +def test_dmp_max_norm(): + assert dmp_max_norm([[[]]], 2, ZZ) == 0 + assert dmp_max_norm([[[1]]], 2, ZZ) == 1 + + assert dmp_max_norm(f_0, 2, ZZ) == 6 + + +def test_dup_l1_norm(): + assert dup_l1_norm([], ZZ) == 0 + assert dup_l1_norm([1], ZZ) == 1 + assert dup_l1_norm([1, 4, 2, 3], ZZ) == 10 + + +def test_dmp_l1_norm(): + assert dmp_l1_norm([[[]]], 2, ZZ) == 0 + assert dmp_l1_norm([[[1]]], 2, ZZ) == 1 + + assert dmp_l1_norm(f_0, 2, ZZ) == 31 + + +def test_dup_l2_norm_squared(): + assert dup_l2_norm_squared([], ZZ) == 0 + assert dup_l2_norm_squared([1], ZZ) == 1 + assert dup_l2_norm_squared([1, 4, 2, 3], ZZ) == 30 + + +def test_dmp_l2_norm_squared(): + assert dmp_l2_norm_squared([[[]]], 2, ZZ) == 0 + assert dmp_l2_norm_squared([[[1]]], 2, ZZ) == 1 + assert dmp_l2_norm_squared(f_0, 2, ZZ) == 111 + + +def test_dup_expand(): + assert dup_expand((), ZZ) == [1] + assert dup_expand(([1, 2, 3], [1, 2], [7, 5, 4, 3]), ZZ) == \ + dup_mul([1, 2, 3], dup_mul([1, 2], [7, 5, 4, 3], ZZ), ZZ) + + +def test_dmp_expand(): + assert dmp_expand((), 1, ZZ) == [[1]] + assert dmp_expand(([[1], [2], [3]], [[1], [2]], [[7], [5], [4], [3]]), 1, ZZ) == \ + dmp_mul([[1], [2], [3]], dmp_mul([[1], [2]], [[7], [5], [ + 4], [3]], 1, ZZ), 1, ZZ) + +def test_dup_mul_poly(): + p = Poly(18786186952704.0*x**165 + 9.31746684052255e+31*x**82, x, domain='RR') + px = Poly(18786186952704.0*x**166 + 9.31746684052255e+31*x**83, x, domain='RR') + + assert p * x == px + assert p.set_domain(QQ) * x == px.set_domain(QQ) + assert p.set_domain(CC) * x == px.set_domain(CC) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densebasic.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densebasic.py new file mode 100644 index 0000000000000000000000000000000000000000..43386d86d0e6ec7b20d3962d8063aa6402165f9a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densebasic.py @@ -0,0 +1,730 @@ +"""Tests for dense recursive polynomials' basic tools. """ + +from sympy.polys.densebasic import ( + ninf, + dup_LC, dmp_LC, + dup_TC, dmp_TC, + dmp_ground_LC, dmp_ground_TC, + dmp_true_LT, + dup_degree, dmp_degree, + dmp_degree_in, dmp_degree_list, + dup_strip, dmp_strip, + dmp_validate, + dup_reverse, + dup_copy, dmp_copy, + dup_normal, dmp_normal, + dup_convert, dmp_convert, + dup_from_sympy, dmp_from_sympy, + dup_nth, dmp_nth, dmp_ground_nth, + dmp_zero_p, dmp_zero, + dmp_one_p, dmp_one, + dmp_ground_p, dmp_ground, + dmp_negative_p, dmp_positive_p, + dmp_zeros, dmp_grounds, + dup_from_dict, dup_from_raw_dict, + dup_to_dict, dup_to_raw_dict, + dmp_from_dict, dmp_to_dict, + dmp_swap, dmp_permute, + dmp_nest, dmp_raise, + dup_deflate, dmp_deflate, + dup_multi_deflate, dmp_multi_deflate, + dup_inflate, dmp_inflate, + dmp_exclude, dmp_include, + dmp_inject, dmp_eject, + dup_terms_gcd, dmp_terms_gcd, + dmp_list_terms, dmp_apply_pairs, + dup_slice, + dup_random, +) + +from sympy.polys.specialpolys import f_polys +from sympy.polys.domains import ZZ, QQ +from sympy.polys.rings import ring + +from sympy.core.singleton import S +from sympy.testing.pytest import raises + +from sympy.core.numbers import oo + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = [ f.to_dense() for f in f_polys() ] + +def test_dup_LC(): + assert dup_LC([], ZZ) == 0 + assert dup_LC([2, 3, 4, 5], ZZ) == 2 + + +def test_dup_TC(): + assert dup_TC([], ZZ) == 0 + assert dup_TC([2, 3, 4, 5], ZZ) == 5 + + +def test_dmp_LC(): + assert dmp_LC([[]], ZZ) == [] + assert dmp_LC([[2, 3, 4], [5]], ZZ) == [2, 3, 4] + assert dmp_LC([[[]]], ZZ) == [[]] + assert dmp_LC([[[2], [3, 4]], [[5]]], ZZ) == [[2], [3, 4]] + + +def test_dmp_TC(): + assert dmp_TC([[]], ZZ) == [] + assert dmp_TC([[2, 3, 4], [5]], ZZ) == [5] + assert dmp_TC([[[]]], ZZ) == [[]] + assert dmp_TC([[[2], [3, 4]], [[5]]], ZZ) == [[5]] + + +def test_dmp_ground_LC(): + assert dmp_ground_LC([[]], 1, ZZ) == 0 + assert dmp_ground_LC([[2, 3, 4], [5]], 1, ZZ) == 2 + assert dmp_ground_LC([[[]]], 2, ZZ) == 0 + assert dmp_ground_LC([[[2], [3, 4]], [[5]]], 2, ZZ) == 2 + + +def test_dmp_ground_TC(): + assert dmp_ground_TC([[]], 1, ZZ) == 0 + assert dmp_ground_TC([[2, 3, 4], [5]], 1, ZZ) == 5 + assert dmp_ground_TC([[[]]], 2, ZZ) == 0 + assert dmp_ground_TC([[[2], [3, 4]], [[5]]], 2, ZZ) == 5 + + +def test_dmp_true_LT(): + assert dmp_true_LT([[]], 1, ZZ) == ((0, 0), 0) + assert dmp_true_LT([[7]], 1, ZZ) == ((0, 0), 7) + + assert dmp_true_LT([[1, 0]], 1, ZZ) == ((0, 1), 1) + assert dmp_true_LT([[1], []], 1, ZZ) == ((1, 0), 1) + assert dmp_true_LT([[1, 0], []], 1, ZZ) == ((1, 1), 1) + + +def test_dup_degree(): + assert ninf == float('-inf') + assert dup_degree([]) is ninf + assert dup_degree([1]) == 0 + assert dup_degree([1, 0]) == 1 + assert dup_degree([1, 0, 0, 0, 1]) == 4 + + +def test_dmp_degree(): + assert dmp_degree([[]], 1) is ninf + assert dmp_degree([[[]]], 2) is ninf + + assert dmp_degree([[1]], 1) == 0 + assert dmp_degree([[2], [1]], 1) == 1 + + +def test_dmp_degree_in(): + assert dmp_degree_in([[[]]], 0, 2) is ninf + assert dmp_degree_in([[[]]], 1, 2) is ninf + assert dmp_degree_in([[[]]], 2, 2) is ninf + + assert dmp_degree_in([[[1]]], 0, 2) == 0 + assert dmp_degree_in([[[1]]], 1, 2) == 0 + assert dmp_degree_in([[[1]]], 2, 2) == 0 + + assert dmp_degree_in(f_4, 0, 2) == 9 + assert dmp_degree_in(f_4, 1, 2) == 12 + assert dmp_degree_in(f_4, 2, 2) == 8 + + assert dmp_degree_in(f_6, 0, 2) == 4 + assert dmp_degree_in(f_6, 1, 2) == 4 + assert dmp_degree_in(f_6, 2, 2) == 6 + assert dmp_degree_in(f_6, 3, 3) == 3 + + raises(IndexError, lambda: dmp_degree_in([[1]], -5, 1)) + + +def test_dmp_degree_list(): + assert dmp_degree_list([[[[ ]]]], 3) == (-oo, -oo, -oo, -oo) + assert dmp_degree_list([[[[1]]]], 3) == ( 0, 0, 0, 0) + + assert dmp_degree_list(f_0, 2) == (2, 2, 2) + assert dmp_degree_list(f_1, 2) == (3, 3, 3) + assert dmp_degree_list(f_2, 2) == (5, 3, 3) + assert dmp_degree_list(f_3, 2) == (5, 4, 7) + assert dmp_degree_list(f_4, 2) == (9, 12, 8) + assert dmp_degree_list(f_5, 2) == (3, 3, 3) + assert dmp_degree_list(f_6, 3) == (4, 4, 6, 3) + + +def test_dup_strip(): + assert dup_strip([]) == [] + assert dup_strip([0]) == [] + assert dup_strip([0, 0, 0]) == [] + + assert dup_strip([1]) == [1] + assert dup_strip([0, 1]) == [1] + assert dup_strip([0, 0, 0, 1]) == [1] + + assert dup_strip([1, 2, 0]) == [1, 2, 0] + assert dup_strip([0, 1, 2, 0]) == [1, 2, 0] + assert dup_strip([0, 0, 0, 1, 2, 0]) == [1, 2, 0] + + +def test_dmp_strip(): + assert dmp_strip([0, 1, 0], 0) == [1, 0] + + assert dmp_strip([[]], 1) == [[]] + assert dmp_strip([[], []], 1) == [[]] + assert dmp_strip([[], [], []], 1) == [[]] + + assert dmp_strip([[[]]], 2) == [[[]]] + assert dmp_strip([[[]], [[]]], 2) == [[[]]] + assert dmp_strip([[[]], [[]], [[]]], 2) == [[[]]] + + assert dmp_strip([[[1]]], 2) == [[[1]]] + assert dmp_strip([[[]], [[1]]], 2) == [[[1]]] + assert dmp_strip([[[]], [[1]], [[]]], 2) == [[[1]], [[]]] + + +def test_dmp_validate(): + assert dmp_validate([]) == ([], 0) + assert dmp_validate([0, 0, 0, 1, 0]) == ([1, 0], 0) + + assert dmp_validate([[[]]]) == ([[[]]], 2) + assert dmp_validate([[0], [], [0], [1], [0]]) == ([[1], []], 1) + + raises(ValueError, lambda: dmp_validate([[0], 0, [0], [1], [0]])) + + +def test_dup_reverse(): + assert dup_reverse([1, 2, 0, 3]) == [3, 0, 2, 1] + assert dup_reverse([1, 2, 3, 0]) == [3, 2, 1] + + +def test_dup_copy(): + f = [ZZ(1), ZZ(0), ZZ(2)] + g = dup_copy(f) + + g[0], g[2] = ZZ(7), ZZ(0) + + assert f != g + + +def test_dmp_copy(): + f = [[ZZ(1)], [ZZ(2), ZZ(0)]] + g = dmp_copy(f, 1) + + g[0][0], g[1][1] = ZZ(7), ZZ(1) + + assert f != g + + +def test_dup_normal(): + assert dup_normal([0, 0, 2, 1, 0, 11, 0], ZZ) == \ + [ZZ(2), ZZ(1), ZZ(0), ZZ(11), ZZ(0)] + + +def test_dmp_normal(): + assert dmp_normal([[0], [], [0, 2, 1], [0], [11], []], 1, ZZ) == \ + [[ZZ(2), ZZ(1)], [], [ZZ(11)], []] + + +def test_dup_convert(): + K0, K1 = ZZ['x'], ZZ + + f = [K0(1), K0(2), K0(0), K0(3)] + + assert dup_convert(f, K0, K1) == \ + [ZZ(1), ZZ(2), ZZ(0), ZZ(3)] + + +def test_dmp_convert(): + K0, K1 = ZZ['x'], ZZ + + f = [[K0(1)], [K0(2)], [], [K0(3)]] + + assert dmp_convert(f, 1, K0, K1) == \ + [[ZZ(1)], [ZZ(2)], [], [ZZ(3)]] + + +def test_dup_from_sympy(): + assert dup_from_sympy([S.One, S(2)], ZZ) == \ + [ZZ(1), ZZ(2)] + assert dup_from_sympy([S.Half, S(3)], QQ) == \ + [QQ(1, 2), QQ(3, 1)] + + +def test_dmp_from_sympy(): + assert dmp_from_sympy([[S.One, S(2)], [S.Zero]], 1, ZZ) == \ + [[ZZ(1), ZZ(2)], []] + assert dmp_from_sympy([[S.Half, S(2)]], 1, QQ) == \ + [[QQ(1, 2), QQ(2, 1)]] + + +def test_dup_nth(): + assert dup_nth([1, 2, 3], 0, ZZ) == 3 + assert dup_nth([1, 2, 3], 1, ZZ) == 2 + assert dup_nth([1, 2, 3], 2, ZZ) == 1 + + assert dup_nth([1, 2, 3], 9, ZZ) == 0 + + raises(IndexError, lambda: dup_nth([3, 4, 5], -1, ZZ)) + + +def test_dmp_nth(): + assert dmp_nth([[1], [2], [3]], 0, 1, ZZ) == [3] + assert dmp_nth([[1], [2], [3]], 1, 1, ZZ) == [2] + assert dmp_nth([[1], [2], [3]], 2, 1, ZZ) == [1] + + assert dmp_nth([[1], [2], [3]], 9, 1, ZZ) == [] + + raises(IndexError, lambda: dmp_nth([[3], [4], [5]], -1, 1, ZZ)) + + +def test_dmp_ground_nth(): + assert dmp_ground_nth([[]], (0, 0), 1, ZZ) == 0 + assert dmp_ground_nth([[1], [2], [3]], (0, 0), 1, ZZ) == 3 + assert dmp_ground_nth([[1], [2], [3]], (1, 0), 1, ZZ) == 2 + assert dmp_ground_nth([[1], [2], [3]], (2, 0), 1, ZZ) == 1 + + assert dmp_ground_nth([[1], [2], [3]], (2, 1), 1, ZZ) == 0 + assert dmp_ground_nth([[1], [2], [3]], (3, 0), 1, ZZ) == 0 + + raises(IndexError, lambda: dmp_ground_nth([[3], [4], [5]], (2, -1), 1, ZZ)) + + +def test_dmp_zero_p(): + assert dmp_zero_p([], 0) is True + assert dmp_zero_p([[]], 1) is True + + assert dmp_zero_p([[[]]], 2) is True + assert dmp_zero_p([[[1]]], 2) is False + + +def test_dmp_zero(): + assert dmp_zero(0) == [] + assert dmp_zero(2) == [[[]]] + + +def test_dmp_one_p(): + assert dmp_one_p([1], 0, ZZ) is True + assert dmp_one_p([[1]], 1, ZZ) is True + assert dmp_one_p([[[1]]], 2, ZZ) is True + assert dmp_one_p([[[12]]], 2, ZZ) is False + + +def test_dmp_one(): + assert dmp_one(0, ZZ) == [ZZ(1)] + assert dmp_one(2, ZZ) == [[[ZZ(1)]]] + + +def test_dmp_ground_p(): + assert dmp_ground_p([], 0, 0) is True + assert dmp_ground_p([[]], 0, 1) is True + assert dmp_ground_p([[]], 1, 1) is False + + assert dmp_ground_p([[ZZ(1)]], 1, 1) is True + assert dmp_ground_p([[[ZZ(2)]]], 2, 2) is True + + assert dmp_ground_p([[[ZZ(2)]]], 3, 2) is False + assert dmp_ground_p([[[ZZ(3)], []]], 3, 2) is False + + assert dmp_ground_p([], None, 0) is True + assert dmp_ground_p([[]], None, 1) is True + + assert dmp_ground_p([ZZ(1)], None, 0) is True + assert dmp_ground_p([[[ZZ(1)]]], None, 2) is True + + assert dmp_ground_p([[[ZZ(3)], []]], None, 2) is False + + +def test_dmp_ground(): + assert dmp_ground(ZZ(0), 2) == [[[]]] + + assert dmp_ground(ZZ(7), -1) == ZZ(7) + assert dmp_ground(ZZ(7), 0) == [ZZ(7)] + assert dmp_ground(ZZ(7), 2) == [[[ZZ(7)]]] + + +def test_dmp_zeros(): + assert dmp_zeros(4, 0, ZZ) == [[], [], [], []] + + assert dmp_zeros(0, 2, ZZ) == [] + assert dmp_zeros(1, 2, ZZ) == [[[[]]]] + assert dmp_zeros(2, 2, ZZ) == [[[[]]], [[[]]]] + assert dmp_zeros(3, 2, ZZ) == [[[[]]], [[[]]], [[[]]]] + + assert dmp_zeros(3, -1, ZZ) == [0, 0, 0] + + +def test_dmp_grounds(): + assert dmp_grounds(ZZ(7), 0, 2) == [] + + assert dmp_grounds(ZZ(7), 1, 2) == [[[[7]]]] + assert dmp_grounds(ZZ(7), 2, 2) == [[[[7]]], [[[7]]]] + assert dmp_grounds(ZZ(7), 3, 2) == [[[[7]]], [[[7]]], [[[7]]]] + + assert dmp_grounds(ZZ(7), 3, -1) == [7, 7, 7] + + +def test_dmp_negative_p(): + assert dmp_negative_p([[[]]], 2, ZZ) is False + assert dmp_negative_p([[[1], [2]]], 2, ZZ) is False + assert dmp_negative_p([[[-1], [2]]], 2, ZZ) is True + + +def test_dmp_positive_p(): + assert dmp_positive_p([[[]]], 2, ZZ) is False + assert dmp_positive_p([[[1], [2]]], 2, ZZ) is True + assert dmp_positive_p([[[-1], [2]]], 2, ZZ) is False + + +def test_dup_from_to_dict(): + assert dup_from_raw_dict({}, ZZ) == [] + assert dup_from_dict({}, ZZ) == [] + + assert dup_to_raw_dict([]) == {} + assert dup_to_dict([]) == {} + + assert dup_to_raw_dict([], ZZ, zero=True) == {0: ZZ(0)} + assert dup_to_dict([], ZZ, zero=True) == {(0,): ZZ(0)} + + f = [3, 0, 0, 2, 0, 0, 0, 0, 8] + g = {8: 3, 5: 2, 0: 8} + h = {(8,): 3, (5,): 2, (0,): 8} + + assert dup_from_raw_dict(g, ZZ) == f + assert dup_from_dict(h, ZZ) == f + + assert dup_to_raw_dict(f) == g + assert dup_to_dict(f) == h + + R, x,y = ring("x,y", ZZ) + K = R.to_domain() + + f = [R(3), R(0), R(2), R(0), R(0), R(8)] + g = {5: R(3), 3: R(2), 0: R(8)} + h = {(5,): R(3), (3,): R(2), (0,): R(8)} + + assert dup_from_raw_dict(g, K) == f + assert dup_from_dict(h, K) == f + + assert dup_to_raw_dict(f) == g + assert dup_to_dict(f) == h + + +def test_dmp_from_to_dict(): + assert dmp_from_dict({}, 1, ZZ) == [[]] + assert dmp_to_dict([[]], 1) == {} + + assert dmp_to_dict([], 0, ZZ, zero=True) == {(0,): ZZ(0)} + assert dmp_to_dict([[]], 1, ZZ, zero=True) == {(0, 0): ZZ(0)} + + f = [[3], [], [], [2], [], [], [], [], [8]] + g = {(8, 0): 3, (5, 0): 2, (0, 0): 8} + + assert dmp_from_dict(g, 1, ZZ) == f + assert dmp_to_dict(f, 1) == g + + +def test_dmp_swap(): + f = dmp_normal([[1, 0, 0], [], [1, 0], [], [1]], 1, ZZ) + g = dmp_normal([[1, 0, 0, 0, 0], [1, 0, 0], [1]], 1, ZZ) + + assert dmp_swap(f, 1, 1, 1, ZZ) == f + + assert dmp_swap(f, 0, 1, 1, ZZ) == g + assert dmp_swap(g, 0, 1, 1, ZZ) == f + + raises(IndexError, lambda: dmp_swap(f, -1, -7, 1, ZZ)) + + +def test_dmp_permute(): + f = dmp_normal([[1, 0, 0], [], [1, 0], [], [1]], 1, ZZ) + g = dmp_normal([[1, 0, 0, 0, 0], [1, 0, 0], [1]], 1, ZZ) + + assert dmp_permute(f, [0, 1], 1, ZZ) == f + assert dmp_permute(g, [0, 1], 1, ZZ) == g + + assert dmp_permute(f, [1, 0], 1, ZZ) == g + assert dmp_permute(g, [1, 0], 1, ZZ) == f + + +def test_dmp_nest(): + assert dmp_nest(ZZ(1), 2, ZZ) == [[[1]]] + + assert dmp_nest([[1]], 0, ZZ) == [[1]] + assert dmp_nest([[1]], 1, ZZ) == [[[1]]] + assert dmp_nest([[1]], 2, ZZ) == [[[[1]]]] + + +def test_dmp_raise(): + assert dmp_raise([], 2, 0, ZZ) == [[[]]] + assert dmp_raise([[1]], 0, 1, ZZ) == [[1]] + + assert dmp_raise([[1, 2, 3], [], [2, 3]], 2, 1, ZZ) == \ + [[[[1]], [[2]], [[3]]], [[[]]], [[[2]], [[3]]]] + + +def test_dup_deflate(): + assert dup_deflate([], ZZ) == (1, []) + assert dup_deflate([2], ZZ) == (1, [2]) + assert dup_deflate([1, 2, 3], ZZ) == (1, [1, 2, 3]) + assert dup_deflate([1, 0, 2, 0, 3], ZZ) == (2, [1, 2, 3]) + + assert dup_deflate(dup_from_raw_dict({7: 1, 1: 1}, ZZ), ZZ) == \ + (1, [1, 0, 0, 0, 0, 0, 1, 0]) + assert dup_deflate(dup_from_raw_dict({7: 1, 0: 1}, ZZ), ZZ) == \ + (7, [1, 1]) + assert dup_deflate(dup_from_raw_dict({7: 1, 3: 1}, ZZ), ZZ) == \ + (1, [1, 0, 0, 0, 1, 0, 0, 0]) + + assert dup_deflate(dup_from_raw_dict({7: 1, 4: 1}, ZZ), ZZ) == \ + (1, [1, 0, 0, 1, 0, 0, 0, 0]) + assert dup_deflate(dup_from_raw_dict({8: 1, 4: 1}, ZZ), ZZ) == \ + (4, [1, 1, 0]) + + assert dup_deflate(dup_from_raw_dict({8: 1}, ZZ), ZZ) == \ + (8, [1, 0]) + assert dup_deflate(dup_from_raw_dict({7: 1}, ZZ), ZZ) == \ + (7, [1, 0]) + assert dup_deflate(dup_from_raw_dict({1: 1}, ZZ), ZZ) == \ + (1, [1, 0]) + + +def test_dmp_deflate(): + assert dmp_deflate([[]], 1, ZZ) == ((1, 1), [[]]) + assert dmp_deflate([[2]], 1, ZZ) == ((1, 1), [[2]]) + + f = [[1, 0, 0], [], [1, 0], [], [1]] + + assert dmp_deflate(f, 1, ZZ) == ((2, 1), [[1, 0, 0], [1, 0], [1]]) + + +def test_dup_multi_deflate(): + assert dup_multi_deflate(([2],), ZZ) == (1, ([2],)) + assert dup_multi_deflate(([], []), ZZ) == (1, ([], [])) + + assert dup_multi_deflate(([1, 2, 3],), ZZ) == (1, ([1, 2, 3],)) + assert dup_multi_deflate(([1, 0, 2, 0, 3],), ZZ) == (2, ([1, 2, 3],)) + + assert dup_multi_deflate(([1, 0, 2, 0, 3], [2, 0, 0]), ZZ) == \ + (2, ([1, 2, 3], [2, 0])) + assert dup_multi_deflate(([1, 0, 2, 0, 3], [2, 1, 0]), ZZ) == \ + (1, ([1, 0, 2, 0, 3], [2, 1, 0])) + + +def test_dmp_multi_deflate(): + assert dmp_multi_deflate(([[]],), 1, ZZ) == \ + ((1, 1), ([[]],)) + assert dmp_multi_deflate(([[]], [[]]), 1, ZZ) == \ + ((1, 1), ([[]], [[]])) + + assert dmp_multi_deflate(([[1]], [[]]), 1, ZZ) == \ + ((1, 1), ([[1]], [[]])) + assert dmp_multi_deflate(([[1]], [[2]]), 1, ZZ) == \ + ((1, 1), ([[1]], [[2]])) + assert dmp_multi_deflate(([[1]], [[2, 0]]), 1, ZZ) == \ + ((1, 1), ([[1]], [[2, 0]])) + + assert dmp_multi_deflate(([[2, 0]], [[2, 0]]), 1, ZZ) == \ + ((1, 1), ([[2, 0]], [[2, 0]])) + + assert dmp_multi_deflate( + ([[2]], [[2, 0, 0]]), 1, ZZ) == ((1, 2), ([[2]], [[2, 0]])) + assert dmp_multi_deflate( + ([[2, 0, 0]], [[2, 0, 0]]), 1, ZZ) == ((1, 2), ([[2, 0]], [[2, 0]])) + + assert dmp_multi_deflate(([2, 0, 0], [1, 0, 4, 0, 1]), 0, ZZ) == \ + ((2,), ([2, 0], [1, 4, 1])) + + f = [[1, 0, 0], [], [1, 0], [], [1]] + g = [[1, 0, 1, 0], [], [1]] + + assert dmp_multi_deflate((f,), 1, ZZ) == \ + ((2, 1), ([[1, 0, 0], [1, 0], [1]],)) + + assert dmp_multi_deflate((f, g), 1, ZZ) == \ + ((2, 1), ([[1, 0, 0], [1, 0], [1]], + [[1, 0, 1, 0], [1]])) + + +def test_dup_inflate(): + assert dup_inflate([], 17, ZZ) == [] + + assert dup_inflate([1, 2, 3], 1, ZZ) == [1, 2, 3] + assert dup_inflate([1, 2, 3], 2, ZZ) == [1, 0, 2, 0, 3] + assert dup_inflate([1, 2, 3], 3, ZZ) == [1, 0, 0, 2, 0, 0, 3] + assert dup_inflate([1, 2, 3], 4, ZZ) == [1, 0, 0, 0, 2, 0, 0, 0, 3] + + raises(IndexError, lambda: dup_inflate([1, 2, 3], 0, ZZ)) + + +def test_dmp_inflate(): + assert dmp_inflate([1], (3,), 0, ZZ) == [1] + + assert dmp_inflate([[]], (3, 7), 1, ZZ) == [[]] + assert dmp_inflate([[2]], (1, 2), 1, ZZ) == [[2]] + + assert dmp_inflate([[2, 0]], (1, 1), 1, ZZ) == [[2, 0]] + assert dmp_inflate([[2, 0]], (1, 2), 1, ZZ) == [[2, 0, 0]] + assert dmp_inflate([[2, 0]], (1, 3), 1, ZZ) == [[2, 0, 0, 0]] + + assert dmp_inflate([[1, 0, 0], [1], [1, 0]], (2, 1), 1, ZZ) == \ + [[1, 0, 0], [], [1], [], [1, 0]] + + raises(IndexError, lambda: dmp_inflate([[]], (-3, 7), 1, ZZ)) + + +def test_dmp_exclude(): + assert dmp_exclude([[[]]], 2, ZZ) == ([], [[[]]], 2) + assert dmp_exclude([[[7]]], 2, ZZ) == ([], [[[7]]], 2) + + assert dmp_exclude([1, 2, 3], 0, ZZ) == ([], [1, 2, 3], 0) + assert dmp_exclude([[1], [2, 3]], 1, ZZ) == ([], [[1], [2, 3]], 1) + + assert dmp_exclude([[1, 2, 3]], 1, ZZ) == ([0], [1, 2, 3], 0) + assert dmp_exclude([[1], [2], [3]], 1, ZZ) == ([1], [1, 2, 3], 0) + + assert dmp_exclude([[[1, 2, 3]]], 2, ZZ) == ([0, 1], [1, 2, 3], 0) + assert dmp_exclude([[[1]], [[2]], [[3]]], 2, ZZ) == ([1, 2], [1, 2, 3], 0) + + +def test_dmp_include(): + assert dmp_include([1, 2, 3], [], 0, ZZ) == [1, 2, 3] + + assert dmp_include([1, 2, 3], [0], 0, ZZ) == [[1, 2, 3]] + assert dmp_include([1, 2, 3], [1], 0, ZZ) == [[1], [2], [3]] + + assert dmp_include([1, 2, 3], [0, 1], 0, ZZ) == [[[1, 2, 3]]] + assert dmp_include([1, 2, 3], [1, 2], 0, ZZ) == [[[1]], [[2]], [[3]]] + + +def test_dmp_inject(): + R, x,y = ring("x,y", ZZ) + K = R.to_domain() + + assert dmp_inject([], 0, K) == ([[[]]], 2) + assert dmp_inject([[]], 1, K) == ([[[[]]]], 3) + + assert dmp_inject([R(1)], 0, K) == ([[[1]]], 2) + assert dmp_inject([[R(1)]], 1, K) == ([[[[1]]]], 3) + + assert dmp_inject([R(1), 2*x + 3*y + 4], 0, K) == ([[[1]], [[2], [3, 4]]], 2) + + f = [3*x**2 + 7*x*y + 5*y**2, 2*x, R(0), x*y**2 + 11] + g = [[[3], [7, 0], [5, 0, 0]], [[2], []], [[]], [[1, 0, 0], [11]]] + + assert dmp_inject(f, 0, K) == (g, 2) + + +def test_dmp_eject(): + R, x,y = ring("x,y", ZZ) + K = R.to_domain() + + assert dmp_eject([[[]]], 2, K) == [] + assert dmp_eject([[[[]]]], 3, K) == [[]] + + assert dmp_eject([[[1]]], 2, K) == [R(1)] + assert dmp_eject([[[[1]]]], 3, K) == [[R(1)]] + + assert dmp_eject([[[1]], [[2], [3, 4]]], 2, K) == [R(1), 2*x + 3*y + 4] + + f = [3*x**2 + 7*x*y + 5*y**2, 2*x, R(0), x*y**2 + 11] + g = [[[3], [7, 0], [5, 0, 0]], [[2], []], [[]], [[1, 0, 0], [11]]] + + assert dmp_eject(g, 2, K) == f + + +def test_dup_terms_gcd(): + assert dup_terms_gcd([], ZZ) == (0, []) + assert dup_terms_gcd([1, 0, 1], ZZ) == (0, [1, 0, 1]) + assert dup_terms_gcd([1, 0, 1, 0], ZZ) == (1, [1, 0, 1]) + + +def test_dmp_terms_gcd(): + assert dmp_terms_gcd([[]], 1, ZZ) == ((0, 0), [[]]) + + assert dmp_terms_gcd([1, 0, 1, 0], 0, ZZ) == ((1,), [1, 0, 1]) + assert dmp_terms_gcd([[1], [], [1], []], 1, ZZ) == ((1, 0), [[1], [], [1]]) + + assert dmp_terms_gcd( + [[1, 0], [], [1]], 1, ZZ) == ((0, 0), [[1, 0], [], [1]]) + assert dmp_terms_gcd( + [[1, 0], [1, 0, 0], [], []], 1, ZZ) == ((2, 1), [[1], [1, 0]]) + + +def test_dmp_list_terms(): + assert dmp_list_terms([[[]]], 2, ZZ) == [((0, 0, 0), 0)] + assert dmp_list_terms([[[1]]], 2, ZZ) == [((0, 0, 0), 1)] + + assert dmp_list_terms([1, 2, 4, 3, 5], 0, ZZ) == \ + [((4,), 1), ((3,), 2), ((2,), 4), ((1,), 3), ((0,), 5)] + + assert dmp_list_terms([[1], [2, 4], [3, 5, 0]], 1, ZZ) == \ + [((2, 0), 1), ((1, 1), 2), ((1, 0), 4), ((0, 2), 3), ((0, 1), 5)] + + f = [[2, 0, 0, 0], [1, 0, 0], []] + + assert dmp_list_terms(f, 1, ZZ, order='lex') == [((2, 3), 2), ((1, 2), 1)] + assert dmp_list_terms( + f, 1, ZZ, order='grlex') == [((2, 3), 2), ((1, 2), 1)] + + f = [[2, 0, 0, 0], [1, 0, 0, 0, 0, 0], []] + + assert dmp_list_terms(f, 1, ZZ, order='lex') == [((2, 3), 2), ((1, 5), 1)] + assert dmp_list_terms( + f, 1, ZZ, order='grlex') == [((1, 5), 1), ((2, 3), 2)] + + +def test_dmp_apply_pairs(): + h = lambda a, b: a*b + + assert dmp_apply_pairs([1, 2, 3], [4, 5, 6], h, [], 0, ZZ) == [4, 10, 18] + + assert dmp_apply_pairs([2, 3], [4, 5, 6], h, [], 0, ZZ) == [10, 18] + assert dmp_apply_pairs([1, 2, 3], [5, 6], h, [], 0, ZZ) == [10, 18] + + assert dmp_apply_pairs( + [[1, 2], [3]], [[4, 5], [6]], h, [], 1, ZZ) == [[4, 10], [18]] + + assert dmp_apply_pairs( + [[1, 2], [3]], [[4], [5, 6]], h, [], 1, ZZ) == [[8], [18]] + assert dmp_apply_pairs( + [[1], [2, 3]], [[4, 5], [6]], h, [], 1, ZZ) == [[5], [18]] + + +def test_dup_slice(): + f = [1, 2, 3, 4] + + assert dup_slice(f, 0, 0, ZZ) == [] + assert dup_slice(f, 0, 1, ZZ) == [4] + assert dup_slice(f, 0, 2, ZZ) == [3, 4] + assert dup_slice(f, 0, 3, ZZ) == [2, 3, 4] + assert dup_slice(f, 0, 4, ZZ) == [1, 2, 3, 4] + + assert dup_slice(f, 0, 4, ZZ) == f + assert dup_slice(f, 0, 9, ZZ) == f + + assert dup_slice(f, 1, 0, ZZ) == [] + assert dup_slice(f, 1, 1, ZZ) == [] + assert dup_slice(f, 1, 2, ZZ) == [3, 0] + assert dup_slice(f, 1, 3, ZZ) == [2, 3, 0] + assert dup_slice(f, 1, 4, ZZ) == [1, 2, 3, 0] + + assert dup_slice([1, 2], 0, 3, ZZ) == [1, 2] + + g = [1, 0, 0, 2] + + assert dup_slice(g, 0, 3, ZZ) == [2] + + +def test_dup_random(): + f = dup_random(0, -10, 10, ZZ) + + assert dup_degree(f) == 0 + assert all(-10 <= c <= 10 for c in f) + + f = dup_random(1, -20, 20, ZZ) + + assert dup_degree(f) == 1 + assert all(-20 <= c <= 20 for c in f) + + f = dup_random(2, -30, 30, ZZ) + + assert dup_degree(f) == 2 + assert all(-30 <= c <= 30 for c in f) + + f = dup_random(3, -40, 40, ZZ) + + assert dup_degree(f) == 3 + assert all(-40 <= c <= 40 for c in f) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densetools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densetools.py new file mode 100644 index 0000000000000000000000000000000000000000..b4bebd2a6f061a13a7d34b7689c696456310f62e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_densetools.py @@ -0,0 +1,714 @@ +"""Tests for dense recursive polynomials' tools. """ + +from sympy.polys.densebasic import ( + dup_normal, dmp_normal, + dup_from_raw_dict, + dmp_convert, dmp_swap, +) + +from sympy.polys.densearith import dmp_mul_ground + +from sympy.polys.densetools import ( + dup_clear_denoms, dmp_clear_denoms, + dup_integrate, dmp_integrate, dmp_integrate_in, + dup_diff, dmp_diff, dmp_diff_in, + dup_eval, dmp_eval, dmp_eval_in, + dmp_eval_tail, dmp_diff_eval_in, + dup_trunc, dmp_trunc, dmp_ground_trunc, + dup_monic, dmp_ground_monic, + dup_content, dmp_ground_content, + dup_primitive, dmp_ground_primitive, + dup_extract, dmp_ground_extract, + dup_real_imag, + dup_mirror, dup_scale, dup_shift, dmp_shift, + dup_transform, + dup_compose, dmp_compose, + dup_decompose, + dmp_lift, + dup_sign_variations, + dup_revert, dmp_revert, +) +from sympy.polys.polyclasses import ANP + +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + ExactQuotientFailed, + NotReversible, + DomainError, +) + +from sympy.polys.specialpolys import f_polys + +from sympy.polys.domains import FF, ZZ, QQ, ZZ_I, QQ_I, EX, RR +from sympy.polys.rings import ring + +from sympy.core.numbers import I +from sympy.core.singleton import S +from sympy.functions.elementary.trigonometric import sin + +from sympy.abc import x +from sympy.testing.pytest import raises + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = [ f.to_dense() for f in f_polys() ] + +def test_dup_integrate(): + assert dup_integrate([], 1, QQ) == [] + assert dup_integrate([], 2, QQ) == [] + + assert dup_integrate([QQ(1)], 1, QQ) == [QQ(1), QQ(0)] + assert dup_integrate([QQ(1)], 2, QQ) == [QQ(1, 2), QQ(0), QQ(0)] + + assert dup_integrate([QQ(1), QQ(2), QQ(3)], 0, QQ) == \ + [QQ(1), QQ(2), QQ(3)] + assert dup_integrate([QQ(1), QQ(2), QQ(3)], 1, QQ) == \ + [QQ(1, 3), QQ(1), QQ(3), QQ(0)] + assert dup_integrate([QQ(1), QQ(2), QQ(3)], 2, QQ) == \ + [QQ(1, 12), QQ(1, 3), QQ(3, 2), QQ(0), QQ(0)] + assert dup_integrate([QQ(1), QQ(2), QQ(3)], 3, QQ) == \ + [QQ(1, 60), QQ(1, 12), QQ(1, 2), QQ(0), QQ(0), QQ(0)] + + assert dup_integrate(dup_from_raw_dict({29: QQ(17)}, QQ), 3, QQ) == \ + dup_from_raw_dict({32: QQ(17, 29760)}, QQ) + + assert dup_integrate(dup_from_raw_dict({29: QQ(17), 5: QQ(1, 2)}, QQ), 3, QQ) == \ + dup_from_raw_dict({32: QQ(17, 29760), 8: QQ(1, 672)}, QQ) + + +def test_dmp_integrate(): + assert dmp_integrate([QQ(1)], 2, 0, QQ) == [QQ(1, 2), QQ(0), QQ(0)] + + assert dmp_integrate([[[]]], 1, 2, QQ) == [[[]]] + assert dmp_integrate([[[]]], 2, 2, QQ) == [[[]]] + + assert dmp_integrate([[[QQ(1)]]], 1, 2, QQ) == [[[QQ(1)]], [[]]] + assert dmp_integrate([[[QQ(1)]]], 2, 2, QQ) == [[[QQ(1, 2)]], [[]], [[]]] + + assert dmp_integrate([[QQ(1)], [QQ(2)], [QQ(3)]], 0, 1, QQ) == \ + [[QQ(1)], [QQ(2)], [QQ(3)]] + assert dmp_integrate([[QQ(1)], [QQ(2)], [QQ(3)]], 1, 1, QQ) == \ + [[QQ(1, 3)], [QQ(1)], [QQ(3)], []] + assert dmp_integrate([[QQ(1)], [QQ(2)], [QQ(3)]], 2, 1, QQ) == \ + [[QQ(1, 12)], [QQ(1, 3)], [QQ(3, 2)], [], []] + assert dmp_integrate([[QQ(1)], [QQ(2)], [QQ(3)]], 3, 1, QQ) == \ + [[QQ(1, 60)], [QQ(1, 12)], [QQ(1, 2)], [], [], []] + + +def test_dmp_integrate_in(): + f = dmp_convert(f_6, 3, ZZ, QQ) + + assert dmp_integrate_in(f, 2, 1, 3, QQ) == \ + dmp_swap( + dmp_integrate(dmp_swap(f, 0, 1, 3, QQ), 2, 3, QQ), 0, 1, 3, QQ) + assert dmp_integrate_in(f, 3, 1, 3, QQ) == \ + dmp_swap( + dmp_integrate(dmp_swap(f, 0, 1, 3, QQ), 3, 3, QQ), 0, 1, 3, QQ) + assert dmp_integrate_in(f, 2, 2, 3, QQ) == \ + dmp_swap( + dmp_integrate(dmp_swap(f, 0, 2, 3, QQ), 2, 3, QQ), 0, 2, 3, QQ) + assert dmp_integrate_in(f, 3, 2, 3, QQ) == \ + dmp_swap( + dmp_integrate(dmp_swap(f, 0, 2, 3, QQ), 3, 3, QQ), 0, 2, 3, QQ) + + raises(IndexError, lambda: dmp_integrate_in(f, 1, -1, 3, QQ)) + raises(IndexError, lambda: dmp_integrate_in(f, 1, 4, 3, QQ)) + + +def test_dup_diff(): + assert dup_diff([], 1, ZZ) == [] + assert dup_diff([7], 1, ZZ) == [] + assert dup_diff([2, 7], 1, ZZ) == [2] + assert dup_diff([1, 2, 1], 1, ZZ) == [2, 2] + assert dup_diff([1, 2, 3, 4], 1, ZZ) == [3, 4, 3] + assert dup_diff([1, -1, 0, 0, 2], 1, ZZ) == [4, -3, 0, 0] + + f = dup_normal([17, 34, 56, -345, 23, 76, 0, 0, 12, 3, 7], ZZ) + + assert dup_diff(f, 0, ZZ) == f + assert dup_diff(f, 1, ZZ) == [170, 306, 448, -2415, 138, 380, 0, 0, 24, 3] + assert dup_diff(f, 2, ZZ) == dup_diff(dup_diff(f, 1, ZZ), 1, ZZ) + assert dup_diff( + f, 3, ZZ) == dup_diff(dup_diff(dup_diff(f, 1, ZZ), 1, ZZ), 1, ZZ) + + K = FF(3) + f = dup_normal([17, 34, 56, -345, 23, 76, 0, 0, 12, 3, 7], K) + + assert dup_diff(f, 1, K) == dup_normal([2, 0, 1, 0, 0, 2, 0, 0, 0, 0], K) + assert dup_diff(f, 2, K) == dup_normal([1, 0, 0, 2, 0, 0, 0], K) + assert dup_diff(f, 3, K) == dup_normal([], K) + + assert dup_diff(f, 0, K) == f + assert dup_diff(f, 2, K) == dup_diff(dup_diff(f, 1, K), 1, K) + assert dup_diff( + f, 3, K) == dup_diff(dup_diff(dup_diff(f, 1, K), 1, K), 1, K) + + +def test_dmp_diff(): + assert dmp_diff([], 1, 0, ZZ) == [] + assert dmp_diff([[]], 1, 1, ZZ) == [[]] + assert dmp_diff([[[]]], 1, 2, ZZ) == [[[]]] + + assert dmp_diff([[[1], [2]]], 1, 2, ZZ) == [[[]]] + + assert dmp_diff([[[1]], [[]]], 1, 2, ZZ) == [[[1]]] + assert dmp_diff([[[3]], [[1]], [[]]], 1, 2, ZZ) == [[[6]], [[1]]] + + assert dmp_diff([1, -1, 0, 0, 2], 1, 0, ZZ) == \ + dup_diff([1, -1, 0, 0, 2], 1, ZZ) + + assert dmp_diff(f_6, 0, 3, ZZ) == f_6 + assert dmp_diff(f_6, 1, 3, ZZ) == [[[[8460]], [[]]], + [[[135, 0, 0], [], [], [-135, 0, 0]]], + [[[]]], + [[[-423]], [[-47]], [[]], [[141], [], [94, 0], []], [[]]]] + assert dmp_diff( + f_6, 2, 3, ZZ) == dmp_diff(dmp_diff(f_6, 1, 3, ZZ), 1, 3, ZZ) + assert dmp_diff(f_6, 3, 3, ZZ) == dmp_diff( + dmp_diff(dmp_diff(f_6, 1, 3, ZZ), 1, 3, ZZ), 1, 3, ZZ) + + K = FF(23) + F_6 = dmp_normal(f_6, 3, K) + + assert dmp_diff(F_6, 0, 3, K) == F_6 + assert dmp_diff(F_6, 1, 3, K) == dmp_diff(F_6, 1, 3, K) + assert dmp_diff(F_6, 2, 3, K) == dmp_diff(dmp_diff(F_6, 1, 3, K), 1, 3, K) + assert dmp_diff(F_6, 3, 3, K) == dmp_diff( + dmp_diff(dmp_diff(F_6, 1, 3, K), 1, 3, K), 1, 3, K) + + +def test_dmp_diff_in(): + assert dmp_diff_in(f_6, 2, 1, 3, ZZ) == \ + dmp_swap(dmp_diff(dmp_swap(f_6, 0, 1, 3, ZZ), 2, 3, ZZ), 0, 1, 3, ZZ) + assert dmp_diff_in(f_6, 3, 1, 3, ZZ) == \ + dmp_swap(dmp_diff(dmp_swap(f_6, 0, 1, 3, ZZ), 3, 3, ZZ), 0, 1, 3, ZZ) + assert dmp_diff_in(f_6, 2, 2, 3, ZZ) == \ + dmp_swap(dmp_diff(dmp_swap(f_6, 0, 2, 3, ZZ), 2, 3, ZZ), 0, 2, 3, ZZ) + assert dmp_diff_in(f_6, 3, 2, 3, ZZ) == \ + dmp_swap(dmp_diff(dmp_swap(f_6, 0, 2, 3, ZZ), 3, 3, ZZ), 0, 2, 3, ZZ) + + raises(IndexError, lambda: dmp_diff_in(f_6, 1, -1, 3, ZZ)) + raises(IndexError, lambda: dmp_diff_in(f_6, 1, 4, 3, ZZ)) + +def test_dup_eval(): + assert dup_eval([], 7, ZZ) == 0 + assert dup_eval([1, 2], 0, ZZ) == 2 + assert dup_eval([1, 2, 3], 7, ZZ) == 66 + + +def test_dmp_eval(): + assert dmp_eval([], 3, 0, ZZ) == 0 + + assert dmp_eval([[]], 3, 1, ZZ) == [] + assert dmp_eval([[[]]], 3, 2, ZZ) == [[]] + + assert dmp_eval([[1, 2]], 0, 1, ZZ) == [1, 2] + + assert dmp_eval([[[1]]], 3, 2, ZZ) == [[1]] + assert dmp_eval([[[1, 2]]], 3, 2, ZZ) == [[1, 2]] + + assert dmp_eval([[3, 2], [1, 2]], 3, 1, ZZ) == [10, 8] + assert dmp_eval([[[3, 2]], [[1, 2]]], 3, 2, ZZ) == [[10, 8]] + + +def test_dmp_eval_in(): + assert dmp_eval_in( + f_6, -2, 1, 3, ZZ) == dmp_eval(dmp_swap(f_6, 0, 1, 3, ZZ), -2, 3, ZZ) + assert dmp_eval_in( + f_6, 7, 1, 3, ZZ) == dmp_eval(dmp_swap(f_6, 0, 1, 3, ZZ), 7, 3, ZZ) + assert dmp_eval_in(f_6, -2, 2, 3, ZZ) == dmp_swap( + dmp_eval(dmp_swap(f_6, 0, 2, 3, ZZ), -2, 3, ZZ), 0, 1, 2, ZZ) + assert dmp_eval_in(f_6, 7, 2, 3, ZZ) == dmp_swap( + dmp_eval(dmp_swap(f_6, 0, 2, 3, ZZ), 7, 3, ZZ), 0, 1, 2, ZZ) + + f = [[[int(45)]], [[]], [[]], [[int(-9)], [-1], [], [int(3), int(0), int(10), int(0)]]] + + assert dmp_eval_in(f, -2, 2, 2, ZZ) == \ + [[45], [], [], [-9, -1, 0, -44]] + + raises(IndexError, lambda: dmp_eval_in(f_6, ZZ(1), -1, 3, ZZ)) + raises(IndexError, lambda: dmp_eval_in(f_6, ZZ(1), 4, 3, ZZ)) + + +def test_dmp_eval_tail(): + assert dmp_eval_tail([[]], [1], 1, ZZ) == [] + assert dmp_eval_tail([[[]]], [1], 2, ZZ) == [[]] + assert dmp_eval_tail([[[]]], [1, 2], 2, ZZ) == [] + + assert dmp_eval_tail(f_0, [], 2, ZZ) == f_0 + + assert dmp_eval_tail(f_0, [1, -17, 8], 2, ZZ) == 84496 + assert dmp_eval_tail(f_0, [-17, 8], 2, ZZ) == [-1409, 3, 85902] + assert dmp_eval_tail(f_0, [8], 2, ZZ) == [[83, 2], [3], [302, 81, 1]] + + assert dmp_eval_tail(f_1, [-17, 8], 2, ZZ) == [-136, 15699, 9166, -27144] + + assert dmp_eval_tail( + f_2, [-12, 3], 2, ZZ) == [-1377, 0, -702, -1224, 0, -624] + assert dmp_eval_tail( + f_3, [-12, 3], 2, ZZ) == [144, 82, -5181, -28872, -14868, -540] + + assert dmp_eval_tail( + f_4, [25, -1], 2, ZZ) == [152587890625, 9765625, -59605407714843750, + -3839159765625, -1562475, 9536712644531250, 610349546750, -4, 24414375000, 1562520] + assert dmp_eval_tail(f_5, [25, -1], 2, ZZ) == [-1, -78, -2028, -17576] + + assert dmp_eval_tail(f_6, [0, 2, 4], 3, ZZ) == [5040, 0, 0, 4480] + + +def test_dmp_diff_eval_in(): + assert dmp_diff_eval_in(f_6, 2, 7, 1, 3, ZZ) == \ + dmp_eval(dmp_diff(dmp_swap(f_6, 0, 1, 3, ZZ), 2, 3, ZZ), 7, 3, ZZ) + + assert dmp_diff_eval_in(f_6, 2, 7, 0, 3, ZZ) == \ + dmp_eval(dmp_diff(f_6, 2, 3, ZZ), 7, 3, ZZ) + + raises(IndexError, lambda: dmp_diff_eval_in(f_6, 1, ZZ(1), 4, 3, ZZ)) + + +def test_dup_revert(): + f = [-QQ(1, 720), QQ(0), QQ(1, 24), QQ(0), -QQ(1, 2), QQ(0), QQ(1)] + g = [QQ(61, 720), QQ(0), QQ(5, 24), QQ(0), QQ(1, 2), QQ(0), QQ(1)] + + assert dup_revert(f, 8, QQ) == g + + raises(NotReversible, lambda: dup_revert([QQ(1), QQ(0)], 3, QQ)) + + +def test_dmp_revert(): + f = [-QQ(1, 720), QQ(0), QQ(1, 24), QQ(0), -QQ(1, 2), QQ(0), QQ(1)] + g = [QQ(61, 720), QQ(0), QQ(5, 24), QQ(0), QQ(1, 2), QQ(0), QQ(1)] + + assert dmp_revert(f, 8, 0, QQ) == g + + raises(MultivariatePolynomialError, lambda: dmp_revert([[1]], 2, 1, QQ)) + + +def test_dup_trunc(): + assert dup_trunc([1, 2, 3, 4, 5, 6], ZZ(3), ZZ) == [1, -1, 0, 1, -1, 0] + assert dup_trunc([6, 5, 4, 3, 2, 1], ZZ(3), ZZ) == [-1, 1, 0, -1, 1] + + R = ZZ_I + assert dup_trunc([R(3), R(4), R(5)], R(3), R) == [R(1), R(-1)] + + K = FF(5) + assert dup_trunc([K(3), K(4), K(5)], K(3), K) == [K(1), K(0)] + + +def test_dmp_trunc(): + assert dmp_trunc([[]], [1, 2], 2, ZZ) == [[]] + assert dmp_trunc([[1, 2], [1, 4, 1], [1]], [1, 2], 1, ZZ) == [[-3], [1]] + + +def test_dmp_ground_trunc(): + assert dmp_ground_trunc(f_0, ZZ(3), 2, ZZ) == \ + dmp_normal( + [[[1, -1, 0], [-1]], [[]], [[1, -1, 0], [1, -1, 1], [1]]], 2, ZZ) + + +def test_dup_monic(): + assert dup_monic([3, 6, 9], ZZ) == [1, 2, 3] + + raises(ExactQuotientFailed, lambda: dup_monic([3, 4, 5], ZZ)) + + assert dup_monic([], QQ) == [] + assert dup_monic([QQ(1)], QQ) == [QQ(1)] + assert dup_monic([QQ(7), QQ(1), QQ(21)], QQ) == [QQ(1), QQ(1, 7), QQ(3)] + + +def test_dmp_ground_monic(): + assert dmp_ground_monic([3, 6, 9], 0, ZZ) == [1, 2, 3] + + assert dmp_ground_monic([[3], [6], [9]], 1, ZZ) == [[1], [2], [3]] + + raises( + ExactQuotientFailed, lambda: dmp_ground_monic([[3], [4], [5]], 1, ZZ)) + + assert dmp_ground_monic([[]], 1, QQ) == [[]] + assert dmp_ground_monic([[QQ(1)]], 1, QQ) == [[QQ(1)]] + assert dmp_ground_monic( + [[QQ(7)], [QQ(1)], [QQ(21)]], 1, QQ) == [[QQ(1)], [QQ(1, 7)], [QQ(3)]] + + +def test_dup_content(): + assert dup_content([], ZZ) == ZZ(0) + assert dup_content([1], ZZ) == ZZ(1) + assert dup_content([-1], ZZ) == ZZ(1) + assert dup_content([1, 1], ZZ) == ZZ(1) + assert dup_content([2, 2], ZZ) == ZZ(2) + assert dup_content([1, 2, 1], ZZ) == ZZ(1) + assert dup_content([2, 4, 2], ZZ) == ZZ(2) + + assert dup_content([QQ(2, 3), QQ(4, 9)], QQ) == QQ(2, 9) + assert dup_content([QQ(2, 3), QQ(4, 5)], QQ) == QQ(2, 15) + + +def test_dmp_ground_content(): + assert dmp_ground_content([[]], 1, ZZ) == ZZ(0) + assert dmp_ground_content([[]], 1, QQ) == QQ(0) + assert dmp_ground_content([[1]], 1, ZZ) == ZZ(1) + assert dmp_ground_content([[-1]], 1, ZZ) == ZZ(1) + assert dmp_ground_content([[1], [1]], 1, ZZ) == ZZ(1) + assert dmp_ground_content([[2], [2]], 1, ZZ) == ZZ(2) + assert dmp_ground_content([[1], [2], [1]], 1, ZZ) == ZZ(1) + assert dmp_ground_content([[2], [4], [2]], 1, ZZ) == ZZ(2) + + assert dmp_ground_content([[QQ(2, 3)], [QQ(4, 9)]], 1, QQ) == QQ(2, 9) + assert dmp_ground_content([[QQ(2, 3)], [QQ(4, 5)]], 1, QQ) == QQ(2, 15) + + assert dmp_ground_content(f_0, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_0, ZZ(2), 2, ZZ), 2, ZZ) == ZZ(2) + + assert dmp_ground_content(f_1, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_1, ZZ(3), 2, ZZ), 2, ZZ) == ZZ(3) + + assert dmp_ground_content(f_2, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_2, ZZ(4), 2, ZZ), 2, ZZ) == ZZ(4) + + assert dmp_ground_content(f_3, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_3, ZZ(5), 2, ZZ), 2, ZZ) == ZZ(5) + + assert dmp_ground_content(f_4, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_4, ZZ(6), 2, ZZ), 2, ZZ) == ZZ(6) + + assert dmp_ground_content(f_5, 2, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_5, ZZ(7), 2, ZZ), 2, ZZ) == ZZ(7) + + assert dmp_ground_content(f_6, 3, ZZ) == ZZ(1) + assert dmp_ground_content( + dmp_mul_ground(f_6, ZZ(8), 3, ZZ), 3, ZZ) == ZZ(8) + + +def test_dup_primitive(): + assert dup_primitive([], ZZ) == (ZZ(0), []) + assert dup_primitive([ZZ(1)], ZZ) == (ZZ(1), [ZZ(1)]) + assert dup_primitive([ZZ(1), ZZ(1)], ZZ) == (ZZ(1), [ZZ(1), ZZ(1)]) + assert dup_primitive([ZZ(2), ZZ(2)], ZZ) == (ZZ(2), [ZZ(1), ZZ(1)]) + assert dup_primitive( + [ZZ(1), ZZ(2), ZZ(1)], ZZ) == (ZZ(1), [ZZ(1), ZZ(2), ZZ(1)]) + assert dup_primitive( + [ZZ(2), ZZ(4), ZZ(2)], ZZ) == (ZZ(2), [ZZ(1), ZZ(2), ZZ(1)]) + + assert dup_primitive([], QQ) == (QQ(0), []) + assert dup_primitive([QQ(1)], QQ) == (QQ(1), [QQ(1)]) + assert dup_primitive([QQ(1), QQ(1)], QQ) == (QQ(1), [QQ(1), QQ(1)]) + assert dup_primitive([QQ(2), QQ(2)], QQ) == (QQ(2), [QQ(1), QQ(1)]) + assert dup_primitive( + [QQ(1), QQ(2), QQ(1)], QQ) == (QQ(1), [QQ(1), QQ(2), QQ(1)]) + assert dup_primitive( + [QQ(2), QQ(4), QQ(2)], QQ) == (QQ(2), [QQ(1), QQ(2), QQ(1)]) + + assert dup_primitive( + [QQ(2, 3), QQ(4, 9)], QQ) == (QQ(2, 9), [QQ(3), QQ(2)]) + assert dup_primitive( + [QQ(2, 3), QQ(4, 5)], QQ) == (QQ(2, 15), [QQ(5), QQ(6)]) + + +def test_dmp_ground_primitive(): + assert dmp_ground_primitive([ZZ(1)], 0, ZZ) == (ZZ(1), [ZZ(1)]) + + assert dmp_ground_primitive([[]], 1, ZZ) == (ZZ(0), [[]]) + + assert dmp_ground_primitive(f_0, 2, ZZ) == (ZZ(1), f_0) + assert dmp_ground_primitive( + dmp_mul_ground(f_0, ZZ(2), 2, ZZ), 2, ZZ) == (ZZ(2), f_0) + + assert dmp_ground_primitive(f_1, 2, ZZ) == (ZZ(1), f_1) + assert dmp_ground_primitive( + dmp_mul_ground(f_1, ZZ(3), 2, ZZ), 2, ZZ) == (ZZ(3), f_1) + + assert dmp_ground_primitive(f_2, 2, ZZ) == (ZZ(1), f_2) + assert dmp_ground_primitive( + dmp_mul_ground(f_2, ZZ(4), 2, ZZ), 2, ZZ) == (ZZ(4), f_2) + + assert dmp_ground_primitive(f_3, 2, ZZ) == (ZZ(1), f_3) + assert dmp_ground_primitive( + dmp_mul_ground(f_3, ZZ(5), 2, ZZ), 2, ZZ) == (ZZ(5), f_3) + + assert dmp_ground_primitive(f_4, 2, ZZ) == (ZZ(1), f_4) + assert dmp_ground_primitive( + dmp_mul_ground(f_4, ZZ(6), 2, ZZ), 2, ZZ) == (ZZ(6), f_4) + + assert dmp_ground_primitive(f_5, 2, ZZ) == (ZZ(1), f_5) + assert dmp_ground_primitive( + dmp_mul_ground(f_5, ZZ(7), 2, ZZ), 2, ZZ) == (ZZ(7), f_5) + + assert dmp_ground_primitive(f_6, 3, ZZ) == (ZZ(1), f_6) + assert dmp_ground_primitive( + dmp_mul_ground(f_6, ZZ(8), 3, ZZ), 3, ZZ) == (ZZ(8), f_6) + + assert dmp_ground_primitive([[ZZ(2)]], 1, ZZ) == (ZZ(2), [[ZZ(1)]]) + assert dmp_ground_primitive([[QQ(2)]], 1, QQ) == (QQ(2), [[QQ(1)]]) + + assert dmp_ground_primitive( + [[QQ(2, 3)], [QQ(4, 9)]], 1, QQ) == (QQ(2, 9), [[QQ(3)], [QQ(2)]]) + assert dmp_ground_primitive( + [[QQ(2, 3)], [QQ(4, 5)]], 1, QQ) == (QQ(2, 15), [[QQ(5)], [QQ(6)]]) + + +def test_dup_extract(): + f = dup_normal([2930944, 0, 2198208, 0, 549552, 0, 45796], ZZ) + g = dup_normal([17585664, 0, 8792832, 0, 1099104, 0], ZZ) + + F = dup_normal([64, 0, 48, 0, 12, 0, 1], ZZ) + G = dup_normal([384, 0, 192, 0, 24, 0], ZZ) + + assert dup_extract(f, g, ZZ) == (45796, F, G) + + +def test_dmp_ground_extract(): + f = dmp_normal( + [[2930944], [], [2198208], [], [549552], [], [45796]], 1, ZZ) + g = dmp_normal([[17585664], [], [8792832], [], [1099104], []], 1, ZZ) + + F = dmp_normal([[64], [], [48], [], [12], [], [1]], 1, ZZ) + G = dmp_normal([[384], [], [192], [], [24], []], 1, ZZ) + + assert dmp_ground_extract(f, g, 1, ZZ) == (45796, F, G) + + +def test_dup_real_imag(): + assert dup_real_imag([], ZZ) == ([[]], [[]]) + assert dup_real_imag([1], ZZ) == ([[1]], [[]]) + + assert dup_real_imag([1, 1], ZZ) == ([[1], [1]], [[1, 0]]) + assert dup_real_imag([1, 2], ZZ) == ([[1], [2]], [[1, 0]]) + + assert dup_real_imag( + [1, 2, 3], ZZ) == ([[1], [2], [-1, 0, 3]], [[2, 0], [2, 0]]) + + assert dup_real_imag([ZZ(1), ZZ(0), ZZ(1), ZZ(3)], ZZ) == ( + [[ZZ(1)], [], [ZZ(-3), ZZ(0), ZZ(1)], [ZZ(3)]], + [[ZZ(3), ZZ(0)], [], [ZZ(-1), ZZ(0), ZZ(1), ZZ(0)]] + ) + + raises(DomainError, lambda: dup_real_imag([EX(1), EX(2)], EX)) + + + +def test_dup_mirror(): + assert dup_mirror([], ZZ) == [] + assert dup_mirror([1], ZZ) == [1] + + assert dup_mirror([1, 2, 3, 4, 5], ZZ) == [1, -2, 3, -4, 5] + assert dup_mirror([1, 2, 3, 4, 5, 6], ZZ) == [-1, 2, -3, 4, -5, 6] + + +def test_dup_scale(): + assert dup_scale([], -1, ZZ) == [] + assert dup_scale([1], -1, ZZ) == [1] + + assert dup_scale([1, 2, 3, 4, 5], -1, ZZ) == [1, -2, 3, -4, 5] + assert dup_scale([1, 2, 3, 4, 5], -7, ZZ) == [2401, -686, 147, -28, 5] + + +def test_dup_shift(): + assert dup_shift([], 1, ZZ) == [] + assert dup_shift([1], 1, ZZ) == [1] + + assert dup_shift([1, 2, 3, 4, 5], 1, ZZ) == [1, 6, 15, 20, 15] + assert dup_shift([1, 2, 3, 4, 5], 7, ZZ) == [1, 30, 339, 1712, 3267] + + +def test_dmp_shift(): + assert dmp_shift([ZZ(1), ZZ(2)], [ZZ(1)], 0, ZZ) == [ZZ(1), ZZ(3)] + + assert dmp_shift([[]], [ZZ(1), ZZ(2)], 1, ZZ) == [[]] + + xy = [[ZZ(1), ZZ(0)], []] # x*y + x1y2 = [[ZZ(1), ZZ(2)], [ZZ(1), ZZ(2)]] # (x+1)*(y+2) + assert dmp_shift(xy, [ZZ(1), ZZ(2)], 1, ZZ) == x1y2 + + +def test_dup_transform(): + assert dup_transform([], [], [1, 1], ZZ) == [] + assert dup_transform([], [1], [1, 1], ZZ) == [] + assert dup_transform([], [1, 2], [1, 1], ZZ) == [] + + assert dup_transform([6, -5, 4, -3, 17], [1, -3, 4], [2, -3], ZZ) == \ + [6, -82, 541, -2205, 6277, -12723, 17191, -13603, 4773] + + +def test_dup_compose(): + assert dup_compose([], [], ZZ) == [] + assert dup_compose([], [1], ZZ) == [] + assert dup_compose([], [1, 2], ZZ) == [] + + assert dup_compose([1], [], ZZ) == [1] + + assert dup_compose([1, 2, 0], [], ZZ) == [] + assert dup_compose([1, 2, 1], [], ZZ) == [1] + + assert dup_compose([1, 2, 1], [1], ZZ) == [4] + assert dup_compose([1, 2, 1], [7], ZZ) == [64] + + assert dup_compose([1, 2, 1], [1, -1], ZZ) == [1, 0, 0] + assert dup_compose([1, 2, 1], [1, 1], ZZ) == [1, 4, 4] + assert dup_compose([1, 2, 1], [1, 2, 1], ZZ) == [1, 4, 8, 8, 4] + + +def test_dmp_compose(): + assert dmp_compose([1, 2, 1], [1, 2, 1], 0, ZZ) == [1, 4, 8, 8, 4] + + assert dmp_compose([[[]]], [[[]]], 2, ZZ) == [[[]]] + assert dmp_compose([[[]]], [[[1]]], 2, ZZ) == [[[]]] + assert dmp_compose([[[]]], [[[1]], [[2]]], 2, ZZ) == [[[]]] + + assert dmp_compose([[[1]]], [], 2, ZZ) == [[[1]]] + + assert dmp_compose([[1], [2], [ ]], [[]], 1, ZZ) == [[]] + assert dmp_compose([[1], [2], [1]], [[]], 1, ZZ) == [[1]] + + assert dmp_compose([[1], [2], [1]], [[1]], 1, ZZ) == [[4]] + assert dmp_compose([[1], [2], [1]], [[7]], 1, ZZ) == [[64]] + + assert dmp_compose([[1], [2], [1]], [[1], [-1]], 1, ZZ) == [[1], [ ], [ ]] + assert dmp_compose([[1], [2], [1]], [[1], [ 1]], 1, ZZ) == [[1], [4], [4]] + + assert dmp_compose( + [[1], [2], [1]], [[1], [2], [1]], 1, ZZ) == [[1], [4], [8], [8], [4]] + + +def test_dup_decompose(): + assert dup_decompose([1], ZZ) == [[1]] + + assert dup_decompose([1, 0], ZZ) == [[1, 0]] + assert dup_decompose([1, 0, 0, 0], ZZ) == [[1, 0, 0, 0]] + + assert dup_decompose([1, 0, 0, 0, 0], ZZ) == [[1, 0, 0], [1, 0, 0]] + assert dup_decompose( + [1, 0, 0, 0, 0, 0, 0], ZZ) == [[1, 0, 0, 0], [1, 0, 0]] + + assert dup_decompose([7, 0, 0, 0, 1], ZZ) == [[7, 0, 1], [1, 0, 0]] + assert dup_decompose([4, 0, 3, 0, 2], ZZ) == [[4, 3, 2], [1, 0, 0]] + + f = [1, 0, 20, 0, 150, 0, 500, 0, 625, -2, 0, -10, 9] + + assert dup_decompose(f, ZZ) == [[1, 0, 0, -2, 9], [1, 0, 5, 0]] + + f = [2, 0, 40, 0, 300, 0, 1000, 0, 1250, -4, 0, -20, 18] + + assert dup_decompose(f, ZZ) == [[2, 0, 0, -4, 18], [1, 0, 5, 0]] + + f = [1, 0, 20, -8, 150, -120, 524, -600, 865, -1034, 600, -170, 29] + + assert dup_decompose(f, ZZ) == [[1, -8, 24, -34, 29], [1, 0, 5, 0]] + + R, t = ring("t", ZZ) + f = [6*t**2 - 42, + 48*t**2 + 96, + 144*t**2 + 648*t + 288, + 624*t**2 + 864*t + 384, + 108*t**3 + 312*t**2 + 432*t + 192] + + assert dup_decompose(f, R.to_domain()) == [f] + + +def test_dmp_lift(): + q = [QQ(1, 1), QQ(0, 1), QQ(1, 1)] + + f_a = [ANP([QQ(1, 1)], q, QQ), ANP([], q, QQ), ANP([], q, QQ), + ANP([QQ(1, 1), QQ(0, 1)], q, QQ), ANP([QQ(17, 1), QQ(0, 1)], q, QQ)] + + f_lift = QQ.map([1, 0, 0, 0, 0, 0, 1, 34, 289]) + + assert dmp_lift(f_a, 0, QQ.algebraic_field(I)) == f_lift + + f_g = [QQ_I(1), QQ_I(0), QQ_I(0), QQ_I(0, 1), QQ_I(0, 17)] + + assert dmp_lift(f_g, 0, QQ_I) == f_lift + + raises(DomainError, lambda: dmp_lift([EX(1), EX(2)], 0, EX)) + + +def test_dup_sign_variations(): + assert dup_sign_variations([], ZZ) == 0 + assert dup_sign_variations([1, 0], ZZ) == 0 + assert dup_sign_variations([1, 0, 2], ZZ) == 0 + assert dup_sign_variations([1, 0, 3, 0], ZZ) == 0 + assert dup_sign_variations([1, 0, 4, 0, 5], ZZ) == 0 + + assert dup_sign_variations([-1, 0, 2], ZZ) == 1 + assert dup_sign_variations([-1, 0, 3, 0], ZZ) == 1 + assert dup_sign_variations([-1, 0, 4, 0, 5], ZZ) == 1 + + assert dup_sign_variations([-1, -4, -5], ZZ) == 0 + assert dup_sign_variations([ 1, -4, -5], ZZ) == 1 + assert dup_sign_variations([ 1, 4, -5], ZZ) == 1 + assert dup_sign_variations([ 1, -4, 5], ZZ) == 2 + assert dup_sign_variations([-1, 4, -5], ZZ) == 2 + assert dup_sign_variations([-1, 4, 5], ZZ) == 1 + assert dup_sign_variations([-1, -4, 5], ZZ) == 1 + assert dup_sign_variations([ 1, 4, 5], ZZ) == 0 + + assert dup_sign_variations([-1, 0, -4, 0, -5], ZZ) == 0 + assert dup_sign_variations([ 1, 0, -4, 0, -5], ZZ) == 1 + assert dup_sign_variations([ 1, 0, 4, 0, -5], ZZ) == 1 + assert dup_sign_variations([ 1, 0, -4, 0, 5], ZZ) == 2 + assert dup_sign_variations([-1, 0, 4, 0, -5], ZZ) == 2 + assert dup_sign_variations([-1, 0, 4, 0, 5], ZZ) == 1 + assert dup_sign_variations([-1, 0, -4, 0, 5], ZZ) == 1 + assert dup_sign_variations([ 1, 0, 4, 0, 5], ZZ) == 0 + + +def test_dup_clear_denoms(): + assert dup_clear_denoms([], QQ, ZZ) == (ZZ(1), []) + + assert dup_clear_denoms([QQ(1)], QQ, ZZ) == (ZZ(1), [QQ(1)]) + assert dup_clear_denoms([QQ(7)], QQ, ZZ) == (ZZ(1), [QQ(7)]) + + assert dup_clear_denoms([QQ(7, 3)], QQ) == (ZZ(3), [QQ(7)]) + assert dup_clear_denoms([QQ(7, 3)], QQ, ZZ) == (ZZ(3), [QQ(7)]) + + assert dup_clear_denoms( + [QQ(3), QQ(1), QQ(0)], QQ, ZZ) == (ZZ(1), [QQ(3), QQ(1), QQ(0)]) + assert dup_clear_denoms( + [QQ(1), QQ(1, 2), QQ(0)], QQ, ZZ) == (ZZ(2), [QQ(2), QQ(1), QQ(0)]) + + assert dup_clear_denoms([QQ(3), QQ( + 1), QQ(0)], QQ, ZZ, convert=True) == (ZZ(1), [ZZ(3), ZZ(1), ZZ(0)]) + assert dup_clear_denoms([QQ(1), QQ( + 1, 2), QQ(0)], QQ, ZZ, convert=True) == (ZZ(2), [ZZ(2), ZZ(1), ZZ(0)]) + + assert dup_clear_denoms( + [EX(S(3)/2), EX(S(9)/4)], EX) == (EX(4), [EX(6), EX(9)]) + + assert dup_clear_denoms([EX(7)], EX) == (EX(1), [EX(7)]) + assert dup_clear_denoms([EX(sin(x)/x), EX(0)], EX) == (EX(x), [EX(sin(x)), EX(0)]) + + F = RR.frac_field(x) + result = dup_clear_denoms([F(8.48717/(8.0089*x + 2.83)), F(0.0)], F) + assert str(result) == "(x + 0.353356890459364, [1.05971731448763, 0.0])" + +def test_dmp_clear_denoms(): + assert dmp_clear_denoms([[]], 1, QQ, ZZ) == (ZZ(1), [[]]) + + assert dmp_clear_denoms([[QQ(1)]], 1, QQ, ZZ) == (ZZ(1), [[QQ(1)]]) + assert dmp_clear_denoms([[QQ(7)]], 1, QQ, ZZ) == (ZZ(1), [[QQ(7)]]) + + assert dmp_clear_denoms([[QQ(7, 3)]], 1, QQ) == (ZZ(3), [[QQ(7)]]) + assert dmp_clear_denoms([[QQ(7, 3)]], 1, QQ, ZZ) == (ZZ(3), [[QQ(7)]]) + + assert dmp_clear_denoms( + [[QQ(3)], [QQ(1)], []], 1, QQ, ZZ) == (ZZ(1), [[QQ(3)], [QQ(1)], []]) + assert dmp_clear_denoms([[QQ( + 1)], [QQ(1, 2)], []], 1, QQ, ZZ) == (ZZ(2), [[QQ(2)], [QQ(1)], []]) + + assert dmp_clear_denoms([QQ(3), QQ( + 1), QQ(0)], 0, QQ, ZZ, convert=True) == (ZZ(1), [ZZ(3), ZZ(1), ZZ(0)]) + assert dmp_clear_denoms([QQ(1), QQ(1, 2), QQ( + 0)], 0, QQ, ZZ, convert=True) == (ZZ(2), [ZZ(2), ZZ(1), ZZ(0)]) + + assert dmp_clear_denoms([[QQ(3)], [QQ( + 1)], []], 1, QQ, ZZ, convert=True) == (ZZ(1), [[QQ(3)], [QQ(1)], []]) + assert dmp_clear_denoms([[QQ(1)], [QQ(1, 2)], []], 1, QQ, ZZ, + convert=True) == (ZZ(2), [[QQ(2)], [QQ(1)], []]) + + assert dmp_clear_denoms( + [[EX(S(3)/2)], [EX(S(9)/4)]], 1, EX) == (EX(4), [[EX(6)], [EX(9)]]) + assert dmp_clear_denoms([[EX(7)]], 1, EX) == (EX(1), [[EX(7)]]) + assert dmp_clear_denoms([[EX(sin(x)/x), EX(0)]], 1, EX) == (EX(x), [[EX(sin(x)), EX(0)]]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_dispersion.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_dispersion.py new file mode 100644 index 0000000000000000000000000000000000000000..ad56b7bebd73c38e037085d36625a41729c0369a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_dispersion.py @@ -0,0 +1,95 @@ +from sympy.core import Symbol, S, oo +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys import poly +from sympy.polys.dispersion import dispersion, dispersionset + + +def test_dispersion(): + x = Symbol("x") + a = Symbol("a") + + fp = poly(S.Zero, x) + assert sorted(dispersionset(fp)) == [0] + + fp = poly(S(2), x) + assert sorted(dispersionset(fp)) == [0] + + fp = poly(x + 1, x) + assert sorted(dispersionset(fp)) == [0] + assert dispersion(fp) == 0 + + fp = poly((x + 1)*(x + 2), x) + assert sorted(dispersionset(fp)) == [0, 1] + assert dispersion(fp) == 1 + + fp = poly(x*(x + 3), x) + assert sorted(dispersionset(fp)) == [0, 3] + assert dispersion(fp) == 3 + + fp = poly((x - 3)*(x + 3), x) + assert sorted(dispersionset(fp)) == [0, 6] + assert dispersion(fp) == 6 + + fp = poly(x**4 - 3*x**2 + 1, x) + gp = fp.shift(-3) + assert sorted(dispersionset(fp, gp)) == [2, 3, 4] + assert dispersion(fp, gp) == 4 + assert sorted(dispersionset(gp, fp)) == [] + assert dispersion(gp, fp) is -oo + + fp = poly(x*(3*x**2+a)*(x-2536)*(x**3+a), x) + gp = fp.as_expr().subs(x, x-345).as_poly(x) + assert sorted(dispersionset(fp, gp)) == [345, 2881] + assert sorted(dispersionset(gp, fp)) == [2191] + + gp = poly((x-2)**2*(x-3)**3*(x-5)**3, x) + assert sorted(dispersionset(gp)) == [0, 1, 2, 3] + assert sorted(dispersionset(gp, (gp+4)**2)) == [1, 2] + + fp = poly(x*(x+2)*(x-1), x) + assert sorted(dispersionset(fp)) == [0, 1, 2, 3] + + fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ') + gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ') + assert sorted(dispersionset(fp, gp)) == [2] + assert sorted(dispersionset(gp, fp)) == [1, 4] + + # There are some difficulties if we compute over Z[a] + # and alpha happens to lie in Z[a] instead of simply Z. + # Hence we can not decide if alpha is indeed integral + # in general. + + fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x) + assert sorted(dispersionset(fp)) == [0, 1] + + # For any specific value of a, the dispersion is 3*a + # but the algorithm can not find this in general. + # This is the point where the resultant based Ansatz + # is superior to the current one. + fp = poly(a**2*x**3 + (a**3 + a**2 + a + 1)*x, x) + gp = fp.as_expr().subs(x, x - 3*a).as_poly(x) + assert sorted(dispersionset(fp, gp)) == [] + + fpa = fp.as_expr().subs(a, 2).as_poly(x) + gpa = gp.as_expr().subs(a, 2).as_poly(x) + assert sorted(dispersionset(fpa, gpa)) == [6] + + # Work with Expr instead of Poly + f = (x + 1)*(x + 2) + assert sorted(dispersionset(f)) == [0, 1] + assert dispersion(f) == 1 + + f = x**4 - 3*x**2 + 1 + g = x**4 - 12*x**3 + 51*x**2 - 90*x + 55 + assert sorted(dispersionset(f, g)) == [2, 3, 4] + assert dispersion(f, g) == 4 + + # Work with Expr and specify a generator + f = (x + 1)*(x + 2) + assert sorted(dispersionset(f, None, x)) == [0, 1] + assert dispersion(f, None, x) == 1 + + f = x**4 - 3*x**2 + 1 + g = x**4 - 12*x**3 + 51*x**2 - 90*x + 55 + assert sorted(dispersionset(f, g, x)) == [2, 3, 4] + assert dispersion(f, g, x) == 4 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_distributedmodules.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_distributedmodules.py new file mode 100644 index 0000000000000000000000000000000000000000..c95672f99f878f3def660aadec901afbde9adf8b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_distributedmodules.py @@ -0,0 +1,208 @@ +"""Tests for sparse distributed modules. """ + +from sympy.polys.distributedmodules import ( + sdm_monomial_mul, sdm_monomial_deg, sdm_monomial_divides, + sdm_add, sdm_LM, sdm_LT, sdm_mul_term, sdm_zero, sdm_deg, + sdm_LC, sdm_from_dict, + sdm_spoly, sdm_ecart, sdm_nf_mora, sdm_groebner, + sdm_from_vector, sdm_to_vector, sdm_monomial_lcm +) + +from sympy.polys.orderings import lex, grlex, InverseOrder +from sympy.polys.domains import QQ + +from sympy.abc import x, y, z + + +def test_sdm_monomial_mul(): + assert sdm_monomial_mul((1, 1, 0), (1, 3)) == (1, 2, 3) + + +def test_sdm_monomial_deg(): + assert sdm_monomial_deg((5, 2, 1)) == 3 + + +def test_sdm_monomial_lcm(): + assert sdm_monomial_lcm((1, 2, 3), (1, 5, 0)) == (1, 5, 3) + + +def test_sdm_monomial_divides(): + assert sdm_monomial_divides((1, 0, 0), (1, 0, 0)) is True + assert sdm_monomial_divides((1, 0, 0), (1, 2, 1)) is True + assert sdm_monomial_divides((5, 1, 1), (5, 2, 1)) is True + + assert sdm_monomial_divides((1, 0, 0), (2, 0, 0)) is False + assert sdm_monomial_divides((1, 1, 0), (1, 0, 0)) is False + assert sdm_monomial_divides((5, 1, 2), (5, 0, 1)) is False + + +def test_sdm_LC(): + assert sdm_LC([((1, 2, 3), QQ(5))], QQ) == QQ(5) + + +def test_sdm_from_dict(): + dic = {(1, 2, 1, 1): QQ(1), (1, 1, 2, 1): QQ(1), (1, 0, 2, 1): QQ(1), + (1, 0, 0, 3): QQ(1), (1, 1, 1, 0): QQ(1)} + assert sdm_from_dict(dic, grlex) == \ + [((1, 2, 1, 1), QQ(1)), ((1, 1, 2, 1), QQ(1)), + ((1, 0, 2, 1), QQ(1)), ((1, 0, 0, 3), QQ(1)), ((1, 1, 1, 0), QQ(1))] + +# TODO test to_dict? + + +def test_sdm_add(): + assert sdm_add([((1, 1, 1), QQ(1))], [((2, 0, 0), QQ(1))], lex, QQ) == \ + [((2, 0, 0), QQ(1)), ((1, 1, 1), QQ(1))] + assert sdm_add([((1, 1, 1), QQ(1))], [((1, 1, 1), QQ(-1))], lex, QQ) == [] + assert sdm_add([((1, 0, 0), QQ(1))], [((1, 0, 0), QQ(2))], lex, QQ) == \ + [((1, 0, 0), QQ(3))] + assert sdm_add([((1, 0, 1), QQ(1))], [((1, 1, 0), QQ(1))], lex, QQ) == \ + [((1, 1, 0), QQ(1)), ((1, 0, 1), QQ(1))] + + +def test_sdm_LM(): + dic = {(1, 2, 3): QQ(1), (4, 0, 0): QQ(1), (4, 0, 1): QQ(1)} + assert sdm_LM(sdm_from_dict(dic, lex)) == (4, 0, 1) + + +def test_sdm_LT(): + dic = {(1, 2, 3): QQ(1), (4, 0, 0): QQ(2), (4, 0, 1): QQ(3)} + assert sdm_LT(sdm_from_dict(dic, lex)) == ((4, 0, 1), QQ(3)) + + +def test_sdm_mul_term(): + assert sdm_mul_term([((1, 0, 0), QQ(1))], ((0, 0), QQ(0)), lex, QQ) == [] + assert sdm_mul_term([], ((1, 0), QQ(1)), lex, QQ) == [] + assert sdm_mul_term([((1, 0, 0), QQ(1))], ((1, 0), QQ(1)), lex, QQ) == \ + [((1, 1, 0), QQ(1))] + f = [((2, 0, 1), QQ(4)), ((1, 1, 0), QQ(3))] + assert sdm_mul_term(f, ((1, 1), QQ(2)), lex, QQ) == \ + [((2, 1, 2), QQ(8)), ((1, 2, 1), QQ(6))] + + +def test_sdm_zero(): + assert sdm_zero() == [] + + +def test_sdm_deg(): + assert sdm_deg([((1, 2, 3), 1), ((10, 0, 1), 1), ((2, 3, 4), 4)]) == 7 + + +def test_sdm_spoly(): + f = [((2, 1, 1), QQ(1)), ((1, 0, 1), QQ(1))] + g = [((2, 3, 0), QQ(1))] + h = [((1, 2, 3), QQ(1))] + assert sdm_spoly(f, h, lex, QQ) == [] + assert sdm_spoly(f, g, lex, QQ) == [((1, 2, 1), QQ(1))] + + +def test_sdm_ecart(): + assert sdm_ecart([((1, 2, 3), 1), ((1, 0, 1), 1)]) == 0 + assert sdm_ecart([((2, 2, 1), 1), ((1, 5, 1), 1)]) == 3 + + +def test_sdm_nf_mora(): + f = sdm_from_dict({(1, 2, 1, 1): QQ(1), (1, 1, 2, 1): QQ(1), + (1, 0, 2, 1): QQ(1), (1, 0, 0, 3): QQ(1), (1, 1, 1, 0): QQ(1)}, + grlex) + f1 = sdm_from_dict({(1, 1, 1, 0): QQ(1), (1, 0, 2, 0): QQ(1), + (1, 0, 0, 0): QQ(-1)}, grlex) + f2 = sdm_from_dict({(1, 1, 1, 0): QQ(1)}, grlex) + (id0, id1, id2) = [sdm_from_dict({(i, 0, 0, 0): QQ(1)}, grlex) + for i in range(3)] + + assert sdm_nf_mora(f, [f1, f2], grlex, QQ, phantom=(id0, [id1, id2])) == \ + ([((1, 0, 2, 1), QQ(1)), ((1, 0, 0, 3), QQ(1)), ((1, 1, 1, 0), QQ(1)), + ((1, 1, 0, 1), QQ(1))], + [((1, 1, 0, 1), QQ(-1)), ((0, 0, 0, 0), QQ(1))]) + assert sdm_nf_mora(f, [f2, f1], grlex, QQ, phantom=(id0, [id2, id1])) == \ + ([((1, 0, 2, 1), QQ(1)), ((1, 0, 0, 3), QQ(1)), ((1, 1, 1, 0), QQ(1))], + [((2, 1, 0, 1), QQ(-1)), ((2, 0, 1, 1), QQ(-1)), ((0, 0, 0, 0), QQ(1))]) + + f = sdm_from_vector([x*z, y**2 + y*z - z, y], lex, QQ, gens=[x, y, z]) + f1 = sdm_from_vector([x, y, 1], lex, QQ, gens=[x, y, z]) + f2 = sdm_from_vector([x*y, z, z**2], lex, QQ, gens=[x, y, z]) + assert sdm_nf_mora(f, [f1, f2], lex, QQ) == \ + sdm_nf_mora(f, [f2, f1], lex, QQ) == \ + [((1, 0, 1, 1), QQ(1)), ((1, 0, 0, 1), QQ(-1)), ((0, 1, 1, 0), QQ(-1)), + ((0, 1, 0, 1), QQ(1))] + + +def test_conversion(): + f = [x**2 + y**2, 2*z] + g = [((1, 0, 0, 1), QQ(2)), ((0, 2, 0, 0), QQ(1)), ((0, 0, 2, 0), QQ(1))] + assert sdm_to_vector(g, [x, y, z], QQ) == f + assert sdm_from_vector(f, lex, QQ) == g + assert sdm_from_vector( + [x, 1], lex, QQ) == [((1, 0), QQ(1)), ((0, 1), QQ(1))] + assert sdm_to_vector([((1, 1, 0, 0), 1)], [x, y, z], QQ, n=3) == [0, x, 0] + assert sdm_from_vector([0, 0], lex, QQ, gens=[x, y]) == sdm_zero() + + +def test_nontrivial(): + gens = [x, y, z] + + def contains(I, f): + S = [sdm_from_vector([g], lex, QQ, gens=gens) for g in I] + G = sdm_groebner(S, sdm_nf_mora, lex, QQ) + return sdm_nf_mora(sdm_from_vector([f], lex, QQ, gens=gens), + G, lex, QQ) == sdm_zero() + + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**3) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y**2) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x**4 + y**3 + 2*z*y*x) + assert contains([x + y + z, x*y + x*z + y*z, x*y*z], x*y*z) + assert contains([x, 1 + x + y, 5 - 7*y], 1) + assert contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**3) + assert not contains( + [x**3 + y**3, y**3 + z**3, z**3 + x**3, x**2*y + x**2*z + y**2*z], + x**2 + y**2) + + # compare local order + assert not contains([x*(1 + x + y), y*(1 + z)], x) + assert not contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_local(): + igrlex = InverseOrder(grlex) + gens = [x, y, z] + + def contains(I, f): + S = [sdm_from_vector([g], igrlex, QQ, gens=gens) for g in I] + G = sdm_groebner(S, sdm_nf_mora, igrlex, QQ) + return sdm_nf_mora(sdm_from_vector([f], lex, QQ, gens=gens), + G, lex, QQ) == sdm_zero() + assert contains([x, y], x) + assert contains([x, y], x + y) + assert not contains([x, y], 1) + assert not contains([x, y], z) + assert contains([x**2 + y, x**2 + x], x - y) + assert not contains([x + y + z, x*y + x*z + y*z, x*y*z], x**2) + assert contains([x*(1 + x + y), y*(1 + z)], x) + assert contains([x*(1 + x + y), y*(1 + z)], x + y) + + +def test_uncovered_line(): + gens = [x, y] + f1 = sdm_zero() + f2 = sdm_from_vector([x, 0], lex, QQ, gens=gens) + f3 = sdm_from_vector([0, y], lex, QQ, gens=gens) + + assert sdm_spoly(f1, f2, lex, QQ) == sdm_zero() + assert sdm_spoly(f3, f2, lex, QQ) == sdm_zero() + + +def test_chain_criterion(): + gens = [x] + f1 = sdm_from_vector([1, x], grlex, QQ, gens=gens) + f2 = sdm_from_vector([0, x - 2], grlex, QQ, gens=gens) + assert len(sdm_groebner([f1, f2], sdm_nf_mora, grlex, QQ)) == 2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_euclidtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_euclidtools.py new file mode 100644 index 0000000000000000000000000000000000000000..3061be73f987163951a5836ff50125d29abc60c7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_euclidtools.py @@ -0,0 +1,712 @@ +"""Tests for Euclidean algorithms, GCDs, LCMs and polynomial remainder sequences. """ + +from sympy.polys.rings import ring +from sympy.polys.domains import ZZ, QQ, RR + +from sympy.polys.specialpolys import ( + f_polys, + dmp_fateman_poly_F_1, + dmp_fateman_poly_F_2, + dmp_fateman_poly_F_3) + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = f_polys() + +def test_dup_gcdex(): + R, x = ring("x", QQ) + + f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15 + g = x**3 + x**2 - 4*x - 4 + + s = -QQ(1,5)*x + QQ(3,5) + t = QQ(1,5)*x**2 - QQ(6,5)*x + 2 + h = x + 1 + + assert R.dup_half_gcdex(f, g) == (s, h) + assert R.dup_gcdex(f, g) == (s, t, h) + + f = x**4 + 4*x**3 - x + 1 + g = x**3 - x + 1 + + s, t, h = R.dup_gcdex(f, g) + S, T, H = R.dup_gcdex(g, f) + + assert R.dup_add(R.dup_mul(s, f), + R.dup_mul(t, g)) == h + assert R.dup_add(R.dup_mul(S, g), + R.dup_mul(T, f)) == H + + f = 2*x + g = x**2 - 16 + + s = QQ(1,32)*x + t = -QQ(1,16) + h = 1 + + assert R.dup_half_gcdex(f, g) == (s, h) + assert R.dup_gcdex(f, g) == (s, t, h) + + +def test_dup_invert(): + R, x = ring("x", QQ) + assert R.dup_invert(2*x, x**2 - 16) == QQ(1,32)*x + + +def test_dup_euclidean_prs(): + R, x = ring("x", QQ) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + assert R.dup_euclidean_prs(f, g) == [ + f, + g, + -QQ(5,9)*x**4 + QQ(1,9)*x**2 - QQ(1,3), + -QQ(117,25)*x**2 - 9*x + QQ(441,25), + QQ(233150,19773)*x - QQ(102500,6591), + -QQ(1288744821,543589225)] + + +def test_dup_primitive_prs(): + R, x = ring("x", ZZ) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + assert R.dup_primitive_prs(f, g) == [ + f, + g, + -5*x**4 + x**2 - 3, + 13*x**2 + 25*x - 49, + 4663*x - 6150, + 1] + + +def test_dup_subresultants(): + R, x = ring("x", ZZ) + + assert R.dup_resultant(0, 0) == 0 + + assert R.dup_resultant(1, 0) == 0 + assert R.dup_resultant(0, 1) == 0 + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + a = 15*x**4 - 3*x**2 + 9 + b = 65*x**2 + 125*x - 245 + c = 9326*x - 12300 + d = 260708 + + assert R.dup_subresultants(f, g) == [f, g, a, b, c, d] + assert R.dup_resultant(f, g) == R.dup_LC(d) + + f = x**2 - 2*x + 1 + g = x**2 - 1 + + a = 2*x - 2 + + assert R.dup_subresultants(f, g) == [f, g, a] + assert R.dup_resultant(f, g) == 0 + + f = x**2 + 1 + g = x**2 - 1 + + a = -2 + + assert R.dup_subresultants(f, g) == [f, g, a] + assert R.dup_resultant(f, g) == 4 + + f = x**2 - 1 + g = x**3 - x**2 + 2 + + assert R.dup_resultant(f, g) == 0 + + f = 3*x**3 - x + g = 5*x**2 + 1 + + assert R.dup_resultant(f, g) == 64 + + f = x**2 - 2*x + 7 + g = x**3 - x + 5 + + assert R.dup_resultant(f, g) == 265 + + f = x**3 - 6*x**2 + 11*x - 6 + g = x**3 - 15*x**2 + 74*x - 120 + + assert R.dup_resultant(f, g) == -8640 + + f = x**3 - 6*x**2 + 11*x - 6 + g = x**3 - 10*x**2 + 29*x - 20 + + assert R.dup_resultant(f, g) == 0 + + f = x**3 - 1 + g = x**3 + 2*x**2 + 2*x - 1 + + assert R.dup_resultant(f, g) == 16 + + f = x**8 - 2 + g = x - 1 + + assert R.dup_resultant(f, g) == -1 + + +def test_dmp_subresultants(): + R, x, y = ring("x,y", ZZ) + + assert R.dmp_resultant(0, 0) == 0 + assert R.dmp_prs_resultant(0, 0)[0] == 0 + assert R.dmp_zz_collins_resultant(0, 0) == 0 + assert R.dmp_qq_collins_resultant(0, 0) == 0 + + assert R.dmp_resultant(1, 0) == 0 + assert R.dmp_resultant(1, 0) == 0 + assert R.dmp_resultant(1, 0) == 0 + + assert R.dmp_resultant(0, 1) == 0 + assert R.dmp_prs_resultant(0, 1)[0] == 0 + assert R.dmp_zz_collins_resultant(0, 1) == 0 + assert R.dmp_qq_collins_resultant(0, 1) == 0 + + f = 3*x**2*y - y**3 - 4 + g = x**2 + x*y**3 - 9 + + a = 3*x*y**4 + y**3 - 27*y + 4 + b = -3*y**10 - 12*y**7 + y**6 - 54*y**4 + 8*y**3 + 729*y**2 - 216*y + 16 + + r = R.dmp_LC(b) + + assert R.dmp_subresultants(f, g) == [f, g, a, b] + + assert R.dmp_resultant(f, g) == r + assert R.dmp_prs_resultant(f, g)[0] == r + assert R.dmp_zz_collins_resultant(f, g) == r + assert R.dmp_qq_collins_resultant(f, g) == r + + f = -x**3 + 5 + g = 3*x**2*y + x**2 + + a = 45*y**2 + 30*y + 5 + b = 675*y**3 + 675*y**2 + 225*y + 25 + + r = R.dmp_LC(b) + + assert R.dmp_subresultants(f, g) == [f, g, a] + assert R.dmp_resultant(f, g) == r + assert R.dmp_prs_resultant(f, g)[0] == r + assert R.dmp_zz_collins_resultant(f, g) == r + assert R.dmp_qq_collins_resultant(f, g) == r + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + + f = 6*x**2 - 3*x*y - 2*x*z + y*z + g = x**2 - x*u - x*v + u*v + + r = y**2*z**2 - 3*y**2*z*u - 3*y**2*z*v + 9*y**2*u*v - 2*y*z**2*u \ + - 2*y*z**2*v + 6*y*z*u**2 + 12*y*z*u*v + 6*y*z*v**2 - 18*y*u**2*v \ + - 18*y*u*v**2 + 4*z**2*u*v - 12*z*u**2*v - 12*z*u*v**2 + 36*u**2*v**2 + + assert R.dmp_zz_collins_resultant(f, g) == r.drop(x) + + R, x, y, z, u, v = ring("x,y,z,u,v", QQ) + + f = x**2 - QQ(1,2)*x*y - QQ(1,3)*x*z + QQ(1,6)*y*z + g = x**2 - x*u - x*v + u*v + + r = QQ(1,36)*y**2*z**2 - QQ(1,12)*y**2*z*u - QQ(1,12)*y**2*z*v + QQ(1,4)*y**2*u*v \ + - QQ(1,18)*y*z**2*u - QQ(1,18)*y*z**2*v + QQ(1,6)*y*z*u**2 + QQ(1,3)*y*z*u*v \ + + QQ(1,6)*y*z*v**2 - QQ(1,2)*y*u**2*v - QQ(1,2)*y*u*v**2 + QQ(1,9)*z**2*u*v \ + - QQ(1,3)*z*u**2*v - QQ(1,3)*z*u*v**2 + u**2*v**2 + + assert R.dmp_qq_collins_resultant(f, g) == r.drop(x) + + Rt, t = ring("t", ZZ) + Rx, x = ring("x", Rt) + + f = x**6 - 5*x**4 + 5*x**2 + 4 + g = -6*t*x**5 + x**4 + 20*t*x**3 - 3*x**2 - 10*t*x + 6 + + assert Rx.dup_resultant(f, g) == 2930944*t**6 + 2198208*t**4 + 549552*t**2 + 45796 + + +def test_dup_discriminant(): + R, x = ring("x", ZZ) + + assert R.dup_discriminant(0) == 0 + assert R.dup_discriminant(x) == 1 + + assert R.dup_discriminant(x**3 + 3*x**2 + 9*x - 13) == -11664 + assert R.dup_discriminant(5*x**5 + x**3 + 2) == 31252160 + assert R.dup_discriminant(x**4 + 2*x**3 + 6*x**2 - 22*x + 13) == 0 + assert R.dup_discriminant(12*x**7 + 15*x**4 + 30*x**3 + x**2 + 1) == -220289699947514112 + + +def test_dmp_discriminant(): + R, x = ring("x", ZZ) + + assert R.dmp_discriminant(0) == 0 + + R, x, y = ring("x,y", ZZ) + + assert R.dmp_discriminant(0) == 0 + assert R.dmp_discriminant(y) == 0 + + assert R.dmp_discriminant(x**3 + 3*x**2 + 9*x - 13) == -11664 + assert R.dmp_discriminant(5*x**5 + x**3 + 2) == 31252160 + assert R.dmp_discriminant(x**4 + 2*x**3 + 6*x**2 - 22*x + 13) == 0 + assert R.dmp_discriminant(12*x**7 + 15*x**4 + 30*x**3 + x**2 + 1) == -220289699947514112 + + assert R.dmp_discriminant(x**2*y + 2*y) == (-8*y**2).drop(x) + assert R.dmp_discriminant(x*y**2 + 2*x) == 1 + + R, x, y, z = ring("x,y,z", ZZ) + assert R.dmp_discriminant(x*y + z) == 1 + + R, x, y, z, u = ring("x,y,z,u", ZZ) + assert R.dmp_discriminant(x**2*y + x*z + u) == (-4*y*u + z**2).drop(x) + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + assert R.dmp_discriminant(x**3*y + x**2*z + x*u + v) == \ + (-27*y**2*v**2 + 18*y*z*u*v - 4*y*u**3 - 4*z**3*v + z**2*u**2).drop(x) + + +def test_dup_gcd(): + R, x = ring("x", ZZ) + + f, g = 0, 0 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (0, 0, 0) + + f, g = 2, 0 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, 1, 0) + + f, g = -2, 0 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, -1, 0) + + f, g = 0, -2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, 0, -1) + + f, g = 0, 2*x + 4 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2*x + 4, 0, 1) + + f, g = 2*x + 4, 0 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2*x + 4, 1, 0) + + f, g = 2, 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, 1, 1) + + f, g = -2, 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, -1, 1) + + f, g = 2, -2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, 1, -1) + + f, g = -2, -2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, -1, -1) + + f, g = x**2 + 2*x + 1, 1 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (1, x**2 + 2*x + 1, 1) + + f, g = x**2 + 2*x + 1, 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (1, x**2 + 2*x + 1, 2) + + f, g = 2*x**2 + 4*x + 2, 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, x**2 + 2*x + 1, 1) + + f, g = 2, 2*x**2 + 4*x + 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (2, 1, x**2 + 2*x + 1) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (x + 1, 1, 2*x + 2) + + f, g = x - 31, x + assert R.dup_zz_heu_gcd(f, g) == R.dup_rr_prs_gcd(f, g) == (1, f, g) + + f = x**4 + 8*x**3 + 21*x**2 + 22*x + 8 + g = x**3 + 6*x**2 + 11*x + 6 + + h = x**2 + 3*x + 2 + + cff = x**2 + 5*x + 4 + cfg = x + 3 + + assert R.dup_zz_heu_gcd(f, g) == (h, cff, cfg) + assert R.dup_rr_prs_gcd(f, g) == (h, cff, cfg) + + f = x**4 - 4 + g = x**4 + 4*x**2 + 4 + + h = x**2 + 2 + + cff = x**2 - 2 + cfg = x**2 + 2 + + assert R.dup_zz_heu_gcd(f, g) == (h, cff, cfg) + assert R.dup_rr_prs_gcd(f, g) == (h, cff, cfg) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + h = 1 + + cff = f + cfg = g + + assert R.dup_zz_heu_gcd(f, g) == (h, cff, cfg) + assert R.dup_rr_prs_gcd(f, g) == (h, cff, cfg) + + R, x = ring("x", QQ) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + h = 1 + + cff = f + cfg = g + + assert R.dup_qq_heu_gcd(f, g) == (h, cff, cfg) + assert R.dup_ff_prs_gcd(f, g) == (h, cff, cfg) + + R, x = ring("x", ZZ) + + f = - 352518131239247345597970242177235495263669787845475025293906825864749649589178600387510272*x**49 \ + + 46818041807522713962450042363465092040687472354933295397472942006618953623327997952*x**42 \ + + 378182690892293941192071663536490788434899030680411695933646320291525827756032*x**35 \ + + 112806468807371824947796775491032386836656074179286744191026149539708928*x**28 \ + - 12278371209708240950316872681744825481125965781519138077173235712*x**21 \ + + 289127344604779611146960547954288113529690984687482920704*x**14 \ + + 19007977035740498977629742919480623972236450681*x**7 \ + + 311973482284542371301330321821976049 + + g = 365431878023781158602430064717380211405897160759702125019136*x**21 \ + + 197599133478719444145775798221171663643171734081650688*x**14 \ + - 9504116979659010018253915765478924103928886144*x**7 \ + - 311973482284542371301330321821976049 + + assert R.dup_zz_heu_gcd(f, R.dup_diff(f, 1))[0] == g + assert R.dup_rr_prs_gcd(f, R.dup_diff(f, 1))[0] == g + + R, x = ring("x", QQ) + + f = QQ(1,2)*x**2 + x + QQ(1,2) + g = QQ(1,2)*x + QQ(1,2) + + h = x + 1 + + assert R.dup_qq_heu_gcd(f, g) == (h, g, QQ(1,2)) + assert R.dup_ff_prs_gcd(f, g) == (h, g, QQ(1,2)) + + R, x = ring("x", ZZ) + + f = 1317378933230047068160*x + 2945748836994210856960 + g = 120352542776360960*x + 269116466014453760 + + h = 120352542776360960*x + 269116466014453760 + cff = 10946 + cfg = 1 + + assert R.dup_zz_heu_gcd(f, g) == (h, cff, cfg) + + +def test_dmp_gcd(): + R, x, y = ring("x,y", ZZ) + + f, g = 0, 0 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (0, 0, 0) + + f, g = 2, 0 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, 1, 0) + + f, g = -2, 0 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, -1, 0) + + f, g = 0, -2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, 0, -1) + + f, g = 0, 2*x + 4 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2*x + 4, 0, 1) + + f, g = 2*x + 4, 0 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2*x + 4, 1, 0) + + f, g = 2, 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, 1, 1) + + f, g = -2, 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, -1, 1) + + f, g = 2, -2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, 1, -1) + + f, g = -2, -2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, -1, -1) + + f, g = x**2 + 2*x + 1, 1 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (1, x**2 + 2*x + 1, 1) + + f, g = x**2 + 2*x + 1, 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (1, x**2 + 2*x + 1, 2) + + f, g = 2*x**2 + 4*x + 2, 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, x**2 + 2*x + 1, 1) + + f, g = 2, 2*x**2 + 4*x + 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (2, 1, x**2 + 2*x + 1) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (x + 1, 1, 2*x + 2) + + R, x, y, z, u = ring("x,y,z,u", ZZ) + + f, g = u**2 + 2*u + 1, 2*u + 2 + assert R.dmp_zz_heu_gcd(f, g) == R.dmp_rr_prs_gcd(f, g) == (u + 1, u + 1, 2) + + f, g = z**2*u**2 + 2*z**2*u + z**2 + z*u + z, u**2 + 2*u + 1 + h, cff, cfg = u + 1, z**2*u + z**2 + z, u + 1 + + assert R.dmp_zz_heu_gcd(f, g) == (h, cff, cfg) + assert R.dmp_rr_prs_gcd(f, g) == (h, cff, cfg) + + assert R.dmp_zz_heu_gcd(g, f) == (h, cfg, cff) + assert R.dmp_rr_prs_gcd(g, f) == (h, cfg, cff) + + R, x, y, z = ring("x,y,z", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_1(2, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + H, cff, cfg = R.dmp_rr_prs_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_1(4, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y, z, u, v, a, b = ring("x,y,z,u,v,a,b", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_1(6, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y, z, u, v, a, b, c, d = ring("x,y,z,u,v,a,b,c,d", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_1(8, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y, z = ring("x,y,z", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_2(2, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + H, cff, cfg = R.dmp_rr_prs_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_3(2, ZZ)) + H, cff, cfg = R.dmp_zz_heu_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + H, cff, cfg = R.dmp_rr_prs_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + + f, g, h = map(R.from_dense, dmp_fateman_poly_F_3(4, ZZ)) + H, cff, cfg = R.dmp_inner_gcd(f, g) + + assert H == h and R.dmp_mul(H, cff) == f \ + and R.dmp_mul(H, cfg) == g + + R, x, y = ring("x,y", QQ) + + f = QQ(1,2)*x**2 + x + QQ(1,2) + g = QQ(1,2)*x + QQ(1,2) + + h = x + 1 + + assert R.dmp_qq_heu_gcd(f, g) == (h, g, QQ(1,2)) + assert R.dmp_ff_prs_gcd(f, g) == (h, g, QQ(1,2)) + + R, x, y = ring("x,y", RR) + + f = 2.1*x*y**2 - 2.2*x*y + 2.1*x + g = 1.0*x**3 + + assert R.dmp_ff_prs_gcd(f, g) == \ + (1.0*x, 2.1*y**2 - 2.2*y + 2.1, 1.0*x**2) + + +def test_dup_lcm(): + R, x = ring("x", ZZ) + + assert R.dup_lcm(2, 6) == 6 + + assert R.dup_lcm(2*x**3, 6*x) == 6*x**3 + assert R.dup_lcm(2*x**3, 3*x) == 6*x**3 + + assert R.dup_lcm(x**2 + x, x) == x**2 + x + assert R.dup_lcm(x**2 + x, 2*x) == 2*x**2 + 2*x + assert R.dup_lcm(x**2 + 2*x, x) == x**2 + 2*x + assert R.dup_lcm(2*x**2 + x, x) == 2*x**2 + x + assert R.dup_lcm(2*x**2 + x, 2*x) == 4*x**2 + 2*x + + +def test_dmp_lcm(): + R, x, y = ring("x,y", ZZ) + + assert R.dmp_lcm(2, 6) == 6 + assert R.dmp_lcm(x, y) == x*y + + assert R.dmp_lcm(2*x**3, 6*x*y**2) == 6*x**3*y**2 + assert R.dmp_lcm(2*x**3, 3*x*y**2) == 6*x**3*y**2 + + assert R.dmp_lcm(x**2*y, x*y**2) == x**2*y**2 + + f = 2*x*y**5 - 3*x*y**4 - 2*x*y**3 + 3*x*y**2 + g = y**5 - 2*y**3 + y + h = 2*x*y**7 - 3*x*y**6 - 4*x*y**5 + 6*x*y**4 + 2*x*y**3 - 3*x*y**2 + + assert R.dmp_lcm(f, g) == h + + f = x**3 - 3*x**2*y - 9*x*y**2 - 5*y**3 + g = x**4 + 6*x**3*y + 12*x**2*y**2 + 10*x*y**3 + 3*y**4 + h = x**5 + x**4*y - 18*x**3*y**2 - 50*x**2*y**3 - 47*x*y**4 - 15*y**5 + + assert R.dmp_lcm(f, g) == h + + +def test_dmp_content(): + R, x,y = ring("x,y", ZZ) + + assert R.dmp_content(-2) == 2 + + f, g, F = 3*y**2 + 2*y + 1, 1, 0 + + for i in range(0, 5): + g *= f + F += x**i*g + + assert R.dmp_content(F) == f.drop(x) + + R, x,y,z = ring("x,y,z", ZZ) + + assert R.dmp_content(f_4) == 1 + assert R.dmp_content(f_5) == 1 + + R, x,y,z,t = ring("x,y,z,t", ZZ) + assert R.dmp_content(f_6) == 1 + + +def test_dmp_primitive(): + R, x,y = ring("x,y", ZZ) + + assert R.dmp_primitive(0) == (0, 0) + assert R.dmp_primitive(1) == (1, 1) + + f, g, F = 3*y**2 + 2*y + 1, 1, 0 + + for i in range(0, 5): + g *= f + F += x**i*g + + assert R.dmp_primitive(F) == (f.drop(x), F / f) + + R, x,y,z = ring("x,y,z", ZZ) + + cont, f = R.dmp_primitive(f_4) + assert cont == 1 and f == f_4 + cont, f = R.dmp_primitive(f_5) + assert cont == 1 and f == f_5 + + R, x,y,z,t = ring("x,y,z,t", ZZ) + + cont, f = R.dmp_primitive(f_6) + assert cont == 1 and f == f_6 + + +def test_dup_cancel(): + R, x = ring("x", ZZ) + + f = 2*x**2 - 2 + g = x**2 - 2*x + 1 + + p = 2*x + 2 + q = x - 1 + + assert R.dup_cancel(f, g) == (p, q) + assert R.dup_cancel(f, g, include=False) == (1, 1, p, q) + + f = -x - 2 + g = 3*x - 4 + + F = x + 2 + G = -3*x + 4 + + assert R.dup_cancel(f, g) == (f, g) + assert R.dup_cancel(F, G) == (f, g) + + assert R.dup_cancel(0, 0) == (0, 0) + assert R.dup_cancel(0, 0, include=False) == (1, 1, 0, 0) + + assert R.dup_cancel(x, 0) == (1, 0) + assert R.dup_cancel(x, 0, include=False) == (1, 1, 1, 0) + + assert R.dup_cancel(0, x) == (0, 1) + assert R.dup_cancel(0, x, include=False) == (1, 1, 0, 1) + + f = 0 + g = x + one = 1 + + assert R.dup_cancel(f, g, include=True) == (f, one) + + +def test_dmp_cancel(): + R, x, y = ring("x,y", ZZ) + + f = 2*x**2 - 2 + g = x**2 - 2*x + 1 + + p = 2*x + 2 + q = x - 1 + + assert R.dmp_cancel(f, g) == (p, q) + assert R.dmp_cancel(f, g, include=False) == (1, 1, p, q) + + assert R.dmp_cancel(0, 0) == (0, 0) + assert R.dmp_cancel(0, 0, include=False) == (1, 1, 0, 0) + + assert R.dmp_cancel(y, 0) == (1, 0) + assert R.dmp_cancel(y, 0, include=False) == (1, 1, 1, 0) + + assert R.dmp_cancel(0, y) == (0, 1) + assert R.dmp_cancel(0, y, include=False) == (1, 1, 0, 1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_factortools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_factortools.py new file mode 100644 index 0000000000000000000000000000000000000000..7f99097c71e9cde761a800b01b149ec5c9896266 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_factortools.py @@ -0,0 +1,784 @@ +"""Tools for polynomial factorization routines in characteristic zero. """ + +from sympy.polys.rings import ring, xring +from sympy.polys.domains import FF, ZZ, QQ, ZZ_I, QQ_I, RR, EX + +from sympy.polys import polyconfig as config +from sympy.polys.polyerrors import DomainError +from sympy.polys.polyclasses import ANP +from sympy.polys.specialpolys import f_polys, w_polys + +from sympy.core.numbers import I +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.ntheory.generate import nextprime +from sympy.testing.pytest import raises, XFAIL + + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = f_polys() +w_1, w_2 = w_polys() + +def test_dup_trial_division(): + R, x = ring("x", ZZ) + assert R.dup_trial_division(x**5 + 8*x**4 + 25*x**3 + 38*x**2 + 28*x + 8, (x + 1, x + 2)) == [(x + 1, 2), (x + 2, 3)] + + +def test_dmp_trial_division(): + R, x, y = ring("x,y", ZZ) + assert R.dmp_trial_division(x**5 + 8*x**4 + 25*x**3 + 38*x**2 + 28*x + 8, (x + 1, x + 2)) == [(x + 1, 2), (x + 2, 3)] + + +def test_dup_zz_mignotte_bound(): + R, x = ring("x", ZZ) + assert R.dup_zz_mignotte_bound(2*x**2 + 3*x + 4) == 6 + assert R.dup_zz_mignotte_bound(x**3 + 14*x**2 + 56*x + 64) == 152 + + +def test_dmp_zz_mignotte_bound(): + R, x, y = ring("x,y", ZZ) + assert R.dmp_zz_mignotte_bound(2*x**2 + 3*x + 4) == 32 + + +def test_dup_zz_hensel_step(): + R, x = ring("x", ZZ) + + f = x**4 - 1 + g = x**3 + 2*x**2 - x - 2 + h = x - 2 + s = -2 + t = 2*x**2 - 2*x - 1 + + G, H, S, T = R.dup_zz_hensel_step(5, f, g, h, s, t) + + assert G == x**3 + 7*x**2 - x - 7 + assert H == x - 7 + assert S == 8 + assert T == -8*x**2 - 12*x - 1 + + +def test_dup_zz_hensel_lift(): + R, x = ring("x", ZZ) + + f = x**4 - 1 + F = [x - 1, x - 2, x + 2, x + 1] + + assert R.dup_zz_hensel_lift(ZZ(5), f, F, 4) == \ + [x - 1, x - 182, x + 182, x + 1] + + +def test_dup_zz_irreducible_p(): + R, x = ring("x", ZZ) + + assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 7) is None + assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 4) is None + + assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 10) is True + assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 14) is True + + +def test_dup_cyclotomic_p(): + R, x = ring("x", ZZ) + + assert R.dup_cyclotomic_p(x - 1) is True + assert R.dup_cyclotomic_p(x + 1) is True + assert R.dup_cyclotomic_p(x**2 + x + 1) is True + assert R.dup_cyclotomic_p(x**2 + 1) is True + assert R.dup_cyclotomic_p(x**4 + x**3 + x**2 + x + 1) is True + assert R.dup_cyclotomic_p(x**2 - x + 1) is True + assert R.dup_cyclotomic_p(x**6 + x**5 + x**4 + x**3 + x**2 + x + 1) is True + assert R.dup_cyclotomic_p(x**4 + 1) is True + assert R.dup_cyclotomic_p(x**6 + x**3 + 1) is True + + assert R.dup_cyclotomic_p(0) is False + assert R.dup_cyclotomic_p(1) is False + assert R.dup_cyclotomic_p(x) is False + assert R.dup_cyclotomic_p(x + 2) is False + assert R.dup_cyclotomic_p(3*x + 1) is False + assert R.dup_cyclotomic_p(x**2 - 1) is False + + f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1 + assert R.dup_cyclotomic_p(f) is False + + g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1 + assert R.dup_cyclotomic_p(g) is True + + R, x = ring("x", QQ) + assert R.dup_cyclotomic_p(x**2 + x + 1) is True + assert R.dup_cyclotomic_p(QQ(1,2)*x**2 + x + 1) is False + + R, x = ring("x", ZZ["y"]) + assert R.dup_cyclotomic_p(x**2 + x + 1) is False + + +def test_dup_zz_cyclotomic_poly(): + R, x = ring("x", ZZ) + + assert R.dup_zz_cyclotomic_poly(1) == x - 1 + assert R.dup_zz_cyclotomic_poly(2) == x + 1 + assert R.dup_zz_cyclotomic_poly(3) == x**2 + x + 1 + assert R.dup_zz_cyclotomic_poly(4) == x**2 + 1 + assert R.dup_zz_cyclotomic_poly(5) == x**4 + x**3 + x**2 + x + 1 + assert R.dup_zz_cyclotomic_poly(6) == x**2 - x + 1 + assert R.dup_zz_cyclotomic_poly(7) == x**6 + x**5 + x**4 + x**3 + x**2 + x + 1 + assert R.dup_zz_cyclotomic_poly(8) == x**4 + 1 + assert R.dup_zz_cyclotomic_poly(9) == x**6 + x**3 + 1 + + +def test_dup_zz_cyclotomic_factor(): + R, x = ring("x", ZZ) + + assert R.dup_zz_cyclotomic_factor(0) is None + assert R.dup_zz_cyclotomic_factor(1) is None + + assert R.dup_zz_cyclotomic_factor(2*x**10 - 1) is None + assert R.dup_zz_cyclotomic_factor(x**10 - 3) is None + assert R.dup_zz_cyclotomic_factor(x**10 + x**5 - 1) is None + + assert R.dup_zz_cyclotomic_factor(x + 1) == [x + 1] + assert R.dup_zz_cyclotomic_factor(x - 1) == [x - 1] + + assert R.dup_zz_cyclotomic_factor(x**2 + 1) == [x**2 + 1] + assert R.dup_zz_cyclotomic_factor(x**2 - 1) == [x - 1, x + 1] + + assert R.dup_zz_cyclotomic_factor(x**27 + 1) == \ + [x + 1, x**2 - x + 1, x**6 - x**3 + 1, x**18 - x**9 + 1] + assert R.dup_zz_cyclotomic_factor(x**27 - 1) == \ + [x - 1, x**2 + x + 1, x**6 + x**3 + 1, x**18 + x**9 + 1] + + +def test_dup_zz_factor(): + R, x = ring("x", ZZ) + + assert R.dup_zz_factor(0) == (0, []) + assert R.dup_zz_factor(7) == (7, []) + assert R.dup_zz_factor(-7) == (-7, []) + + assert R.dup_zz_factor_sqf(0) == (0, []) + assert R.dup_zz_factor_sqf(7) == (7, []) + assert R.dup_zz_factor_sqf(-7) == (-7, []) + + assert R.dup_zz_factor(2*x + 4) == (2, [(x + 2, 1)]) + assert R.dup_zz_factor_sqf(2*x + 4) == (2, [x + 2]) + + f = x**4 + x + 1 + + for i in range(0, 20): + assert R.dup_zz_factor(f) == (1, [(f, 1)]) + + assert R.dup_zz_factor(x**2 + 2*x + 2) == \ + (1, [(x**2 + 2*x + 2, 1)]) + + assert R.dup_zz_factor(18*x**2 + 12*x + 2) == \ + (2, [(3*x + 1, 2)]) + + assert R.dup_zz_factor(-9*x**2 + 1) == \ + (-1, [(3*x - 1, 1), + (3*x + 1, 1)]) + + assert R.dup_zz_factor_sqf(-9*x**2 + 1) == \ + (-1, [3*x - 1, + 3*x + 1]) + + # The order of the factors will be different when the ground types are + # flint. At the higher level dup_factor_list will sort the factors. + c, factors = R.dup_zz_factor(x**3 - 6*x**2 + 11*x - 6) + assert c == 1 + assert set(factors) == {(x - 3, 1), (x - 2, 1), (x - 1, 1)} + + assert R.dup_zz_factor_sqf(x**3 - 6*x**2 + 11*x - 6) == \ + (1, [x - 3, + x - 2, + x - 1]) + + assert R.dup_zz_factor(3*x**3 + 10*x**2 + 13*x + 10) == \ + (1, [(x + 2, 1), + (3*x**2 + 4*x + 5, 1)]) + + assert R.dup_zz_factor_sqf(3*x**3 + 10*x**2 + 13*x + 10) == \ + (1, [x + 2, + 3*x**2 + 4*x + 5]) + + c, factors = R.dup_zz_factor(-x**6 + x**2) + assert c == -1 + assert set(factors) == {(x, 2), (x - 1, 1), (x + 1, 1), (x**2 + 1, 1)} + + f = 1080*x**8 + 5184*x**7 + 2099*x**6 + 744*x**5 + 2736*x**4 - 648*x**3 + 129*x**2 - 324 + + assert R.dup_zz_factor(f) == \ + (1, [(5*x**4 + 24*x**3 + 9*x**2 + 12, 1), + (216*x**4 + 31*x**2 - 27, 1)]) + + f = -29802322387695312500000000000000000000*x**25 \ + + 2980232238769531250000000000000000*x**20 \ + + 1743435859680175781250000000000*x**15 \ + + 114142894744873046875000000*x**10 \ + - 210106372833251953125*x**5 \ + + 95367431640625 + + c, factors = R.dup_zz_factor(f) + assert c == -95367431640625 + assert set(factors) == { + (5*x - 1, 1), + (100*x**2 + 10*x - 1, 2), + (625*x**4 + 125*x**3 + 25*x**2 + 5*x + 1, 1), + (10000*x**4 - 3000*x**3 + 400*x**2 - 20*x + 1, 2), + (10000*x**4 + 2000*x**3 + 400*x**2 + 30*x + 1, 2), + } + + f = x**10 - 1 + + config.setup('USE_CYCLOTOMIC_FACTOR', True) + c0, F_0 = R.dup_zz_factor(f) + + config.setup('USE_CYCLOTOMIC_FACTOR', False) + c1, F_1 = R.dup_zz_factor(f) + + assert c0 == c1 == 1 + assert set(F_0) == set(F_1) == { + (x - 1, 1), + (x + 1, 1), + (x**4 - x**3 + x**2 - x + 1, 1), + (x**4 + x**3 + x**2 + x + 1, 1), + } + + config.setup('USE_CYCLOTOMIC_FACTOR') + + f = x**10 + 1 + + config.setup('USE_CYCLOTOMIC_FACTOR', True) + F_0 = R.dup_zz_factor(f) + + config.setup('USE_CYCLOTOMIC_FACTOR', False) + F_1 = R.dup_zz_factor(f) + + assert F_0 == F_1 == \ + (1, [(x**2 + 1, 1), + (x**8 - x**6 + x**4 - x**2 + 1, 1)]) + + config.setup('USE_CYCLOTOMIC_FACTOR') + +def test_dmp_zz_wang(): + R, x,y,z = ring("x,y,z", ZZ) + UV, _x = ring("x", ZZ) + + p = ZZ(nextprime(R.dmp_zz_mignotte_bound(w_1))) + assert p == 6291469 + + t_1, k_1, e_1 = y, 1, ZZ(-14) + t_2, k_2, e_2 = z, 2, ZZ(3) + t_3, k_3, e_3 = y + z, 2, ZZ(-11) + t_4, k_4, e_4 = y - z, 1, ZZ(-17) + + T = [t_1, t_2, t_3, t_4] + K = [k_1, k_2, k_3, k_4] + E = [e_1, e_2, e_3, e_4] + + T = zip([ t.drop(x) for t in T ], K) + + A = [ZZ(-14), ZZ(3)] + + S = R.dmp_eval_tail(w_1, A) + cs, s = UV.dup_primitive(S) + + assert cs == 1 and s == S == \ + 1036728*_x**6 + 915552*_x**5 + 55748*_x**4 + 105621*_x**3 - 17304*_x**2 - 26841*_x - 644 + + assert R.dmp_zz_wang_non_divisors(E, cs, ZZ(4)) == [7, 3, 11, 17] + assert UV.dup_sqf_p(s) and UV.dup_degree(s) == R.dmp_degree(w_1) + + _, H = UV.dup_zz_factor_sqf(s) + + h_1 = 44*_x**2 + 42*_x + 1 + h_2 = 126*_x**2 - 9*_x + 28 + h_3 = 187*_x**2 - 23 + + assert H == [h_1, h_2, h_3] + + LC = [ lc.drop(x) for lc in [-4*y - 4*z, -y*z**2, y**2 - z**2] ] + + assert R.dmp_zz_wang_lead_coeffs(w_1, T, cs, E, H, A) == (w_1, H, LC) + + factors = R.dmp_zz_wang_hensel_lifting(w_1, H, LC, A, p) + assert R.dmp_expand(factors) == w_1 + + +@XFAIL +def test_dmp_zz_wang_fail(): + R, x,y,z = ring("x,y,z", ZZ) + UV, _x = ring("x", ZZ) + + p = ZZ(nextprime(R.dmp_zz_mignotte_bound(w_1))) + assert p == 6291469 + + H_1 = [44*x**2 + 42*x + 1, 126*x**2 - 9*x + 28, 187*x**2 - 23] + H_2 = [-4*x**2*y - 12*x**2 - 3*x*y + 1, -9*x**2*y - 9*x - 2*y, x**2*y**2 - 9*x**2 + y - 9] + H_3 = [-4*x**2*y - 12*x**2 - 3*x*y + 1, -9*x**2*y - 9*x - 2*y, x**2*y**2 - 9*x**2 + y - 9] + + c_1 = -70686*x**5 - 5863*x**4 - 17826*x**3 + 2009*x**2 + 5031*x + 74 + c_2 = 9*x**5*y**4 + 12*x**5*y**3 - 45*x**5*y**2 - 108*x**5*y - 324*x**5 + 18*x**4*y**3 - 216*x**4*y**2 - 810*x**4*y + 2*x**3*y**4 + 9*x**3*y**3 - 252*x**3*y**2 - 288*x**3*y - 945*x**3 - 30*x**2*y**2 - 414*x**2*y + 2*x*y**3 - 54*x*y**2 - 3*x*y + 81*x + 12*y + c_3 = -36*x**4*y**2 - 108*x**4*y - 27*x**3*y**2 - 36*x**3*y - 108*x**3 - 8*x**2*y**2 - 42*x**2*y - 6*x*y**2 + 9*x + 2*y + + assert R.dmp_zz_diophantine(H_1, c_1, [], 5, p) == [-3*x, -2, 1] + assert R.dmp_zz_diophantine(H_2, c_2, [ZZ(-14)], 5, p) == [-x*y, -3*x, -6] + assert R.dmp_zz_diophantine(H_3, c_3, [ZZ(-14)], 5, p) == [0, 0, -1] + + +def test_issue_6355(): + # This tests a bug in the Wang algorithm that occurred only with a very + # specific set of random numbers. + random_sequence = [-1, -1, 0, 0, 0, 0, -1, -1, 0, -1, 3, -1, 3, 3, 3, 3, -1, 3] + + R, x, y, z = ring("x,y,z", ZZ) + f = 2*x**2 + y*z - y - z**2 + z + + assert R.dmp_zz_wang(f, seed=random_sequence) == [f] + + +def test_dmp_zz_factor(): + R, x = ring("x", ZZ) + assert R.dmp_zz_factor(0) == (0, []) + assert R.dmp_zz_factor(7) == (7, []) + assert R.dmp_zz_factor(-7) == (-7, []) + + assert R.dmp_zz_factor(x**2 - 9) == (1, [(x - 3, 1), (x + 3, 1)]) + + R, x, y = ring("x,y", ZZ) + assert R.dmp_zz_factor(0) == (0, []) + assert R.dmp_zz_factor(7) == (7, []) + assert R.dmp_zz_factor(-7) == (-7, []) + + assert R.dmp_zz_factor(x) == (1, [(x, 1)]) + assert R.dmp_zz_factor(4*x) == (4, [(x, 1)]) + assert R.dmp_zz_factor(4*x + 2) == (2, [(2*x + 1, 1)]) + assert R.dmp_zz_factor(x*y + 1) == (1, [(x*y + 1, 1)]) + assert R.dmp_zz_factor(y**2 + 1) == (1, [(y**2 + 1, 1)]) + assert R.dmp_zz_factor(y**2 - 1) == (1, [(y - 1, 1), (y + 1, 1)]) + + assert R.dmp_zz_factor(x**2*y**2 + 6*x**2*y + 9*x**2 - 1) == (1, [(x*y + 3*x - 1, 1), (x*y + 3*x + 1, 1)]) + assert R.dmp_zz_factor(x**2*y**2 - 9) == (1, [(x*y - 3, 1), (x*y + 3, 1)]) + + R, x, y, z = ring("x,y,z", ZZ) + assert R.dmp_zz_factor(x**2*y**2*z**2 - 9) == \ + (1, [(x*y*z - 3, 1), + (x*y*z + 3, 1)]) + + R, x, y, z, u = ring("x,y,z,u", ZZ) + assert R.dmp_zz_factor(x**2*y**2*z**2*u**2 - 9) == \ + (1, [(x*y*z*u - 3, 1), + (x*y*z*u + 3, 1)]) + + R, x, y, z = ring("x,y,z", ZZ) + assert R.dmp_zz_factor(f_1) == \ + (1, [(x + y*z + 20, 1), + (x*y + z + 10, 1), + (x*z + y + 30, 1)]) + + assert R.dmp_zz_factor(f_2) == \ + (1, [(x**2*y**2 + x**2*z**2 + y + 90, 1), + (x**3*y + x**3*z + z - 11, 1)]) + + assert R.dmp_zz_factor(f_3) == \ + (1, [(x**2*y**2 + x*z**4 + x + z, 1), + (x**3 + x*y*z + y**2 + y*z**3, 1)]) + + assert R.dmp_zz_factor(f_4) == \ + (-1, [(x*y**3 + z**2, 1), + (x**2*z + y**4*z**2 + 5, 1), + (x**3*y - z**2 - 3, 1), + (x**3*y**4 + z**2, 1)]) + + assert R.dmp_zz_factor(f_5) == \ + (-1, [(x + y - z, 3)]) + + R, x, y, z, t = ring("x,y,z,t", ZZ) + assert R.dmp_zz_factor(f_6) == \ + (1, [(47*x*y + z**3*t**2 - t**2, 1), + (45*x**3 - 9*y**3 - y**2 + 3*z**3 + 2*z*t, 1)]) + + R, x, y, z = ring("x,y,z", ZZ) + assert R.dmp_zz_factor(w_1) == \ + (1, [(x**2*y**2 - x**2*z**2 + y - z**2, 1), + (x**2*y*z**2 + 3*x*z + 2*y, 1), + (4*x**2*y + 4*x**2*z + x*y*z - 1, 1)]) + + R, x, y = ring("x,y", ZZ) + f = -12*x**16*y + 240*x**12*y**3 - 768*x**10*y**4 + 1080*x**8*y**5 - 768*x**6*y**6 + 240*x**4*y**7 - 12*y**9 + + assert R.dmp_zz_factor(f) == \ + (-12, [(y, 1), + (x**2 - y, 6), + (x**4 + 6*x**2*y + y**2, 1)]) + + +def test_dup_qq_i_factor(): + R, x = ring("x", QQ_I) + i = QQ_I(0, 1) + + assert R.dup_qq_i_factor(x**2 - 2) == (QQ_I(1, 0), [(x**2 - 2, 1)]) + + assert R.dup_qq_i_factor(x**2 - 1) == (QQ_I(1, 0), [(x - 1, 1), (x + 1, 1)]) + + assert R.dup_qq_i_factor(x**2 + 1) == (QQ_I(1, 0), [(x - i, 1), (x + i, 1)]) + + assert R.dup_qq_i_factor(x**2/4 + 1) == \ + (QQ_I(QQ(1, 4), 0), [(x - 2*i, 1), (x + 2*i, 1)]) + + assert R.dup_qq_i_factor(x**2 + 4) == \ + (QQ_I(1, 0), [(x - 2*i, 1), (x + 2*i, 1)]) + + assert R.dup_qq_i_factor(x**2 + 2*x + 1) == \ + (QQ_I(1, 0), [(x + 1, 2)]) + + assert R.dup_qq_i_factor(x**2 + 2*i*x - 1) == \ + (QQ_I(1, 0), [(x + i, 2)]) + + f = 8192*x**2 + x*(22656 + 175232*i) - 921416 + 242313*i + + assert R.dup_qq_i_factor(f) == \ + (QQ_I(8192, 0), [(x + QQ_I(QQ(177, 128), QQ(1369, 128)), 2)]) + + +def test_dmp_qq_i_factor(): + R, x, y = ring("x, y", QQ_I) + i = QQ_I(0, 1) + + assert R.dmp_qq_i_factor(x**2 + 2*y**2) == \ + (QQ_I(1, 0), [(x**2 + 2*y**2, 1)]) + + assert R.dmp_qq_i_factor(x**2 + y**2) == \ + (QQ_I(1, 0), [(x - i*y, 1), (x + i*y, 1)]) + + assert R.dmp_qq_i_factor(x**2 + y**2/4) == \ + (QQ_I(1, 0), [(x - i*y/2, 1), (x + i*y/2, 1)]) + + assert R.dmp_qq_i_factor(4*x**2 + y**2) == \ + (QQ_I(4, 0), [(x - i*y/2, 1), (x + i*y/2, 1)]) + + +def test_dup_zz_i_factor(): + R, x = ring("x", ZZ_I) + i = ZZ_I(0, 1) + + assert R.dup_zz_i_factor(x**2 - 2) == (ZZ_I(1, 0), [(x**2 - 2, 1)]) + + assert R.dup_zz_i_factor(x**2 - 1) == (ZZ_I(1, 0), [(x - 1, 1), (x + 1, 1)]) + + assert R.dup_zz_i_factor(x**2 + 1) == (ZZ_I(1, 0), [(x - i, 1), (x + i, 1)]) + + assert R.dup_zz_i_factor(x**2 + 4) == \ + (ZZ_I(1, 0), [(x - 2*i, 1), (x + 2*i, 1)]) + + assert R.dup_zz_i_factor(x**2 + 2*x + 1) == \ + (ZZ_I(1, 0), [(x + 1, 2)]) + + assert R.dup_zz_i_factor(x**2 + 2*i*x - 1) == \ + (ZZ_I(1, 0), [(x + i, 2)]) + + f = 8192*x**2 + x*(22656 + 175232*i) - 921416 + 242313*i + + assert R.dup_zz_i_factor(f) == \ + (ZZ_I(0, 1), [((64 - 64*i)*x + (773 + 596*i), 2)]) + + +def test_dmp_zz_i_factor(): + R, x, y = ring("x, y", ZZ_I) + i = ZZ_I(0, 1) + + assert R.dmp_zz_i_factor(x**2 + 2*y**2) == \ + (ZZ_I(1, 0), [(x**2 + 2*y**2, 1)]) + + assert R.dmp_zz_i_factor(x**2 + y**2) == \ + (ZZ_I(1, 0), [(x - i*y, 1), (x + i*y, 1)]) + + assert R.dmp_zz_i_factor(4*x**2 + y**2) == \ + (ZZ_I(1, 0), [(2*x - i*y, 1), (2*x + i*y, 1)]) + + +def test_dup_ext_factor(): + R, x = ring("x", QQ.algebraic_field(I)) + def anp(element): + return ANP(element, [QQ(1), QQ(0), QQ(1)], QQ) + + assert R.dup_ext_factor(0) == (anp([]), []) + + f = anp([QQ(1)])*x + anp([QQ(1)]) + + assert R.dup_ext_factor(f) == (anp([QQ(1)]), [(f, 1)]) + + g = anp([QQ(2)])*x + anp([QQ(2)]) + + assert R.dup_ext_factor(g) == (anp([QQ(2)]), [(f, 1)]) + + f = anp([QQ(7)])*x**4 + anp([QQ(1, 1)]) + g = anp([QQ(1)])*x**4 + anp([QQ(1, 7)]) + + assert R.dup_ext_factor(f) == (anp([QQ(7)]), [(g, 1)]) + + f = anp([QQ(1)])*x**4 + anp([QQ(1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(1, 1)]), [(anp([QQ(1)])*x**2 + anp([QQ(-1), QQ(0)]), 1), + (anp([QQ(1)])*x**2 + anp([QQ( 1), QQ(0)]), 1)]) + + f = anp([QQ(4, 1)])*x**2 + anp([QQ(9, 1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(4, 1)]), [(anp([QQ(1, 1)])*x + anp([-QQ(3, 2), QQ(0, 1)]), 1), + (anp([QQ(1, 1)])*x + anp([ QQ(3, 2), QQ(0, 1)]), 1)]) + + f = anp([QQ(4, 1)])*x**4 + anp([QQ(8, 1)])*x**3 + anp([QQ(77, 1)])*x**2 + anp([QQ(18, 1)])*x + anp([QQ(153, 1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(4, 1)]), [(anp([QQ(1, 1)])*x + anp([-QQ(4, 1), QQ(1, 1)]), 1), + (anp([QQ(1, 1)])*x + anp([-QQ(3, 2), QQ(0, 1)]), 1), + (anp([QQ(1, 1)])*x + anp([ QQ(3, 2), QQ(0, 1)]), 1), + (anp([QQ(1, 1)])*x + anp([ QQ(4, 1), QQ(1, 1)]), 1)]) + + R, x = ring("x", QQ.algebraic_field(sqrt(2))) + def anp(element): + return ANP(element, [QQ(1), QQ(0), QQ(-2)], QQ) + + f = anp([QQ(1)])*x**4 + anp([QQ(1, 1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(1)]), [(anp([QQ(1)])*x**2 + anp([QQ(-1), QQ(0)])*x + anp([QQ(1)]), 1), + (anp([QQ(1)])*x**2 + anp([QQ( 1), QQ(0)])*x + anp([QQ(1)]), 1)]) + + f = anp([QQ(1, 1)])*x**2 + anp([QQ(2), QQ(0)])*x + anp([QQ(2, 1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(1, 1)]), [(anp([1])*x + anp([1, 0]), 2)]) + + assert R.dup_ext_factor(f**3) == \ + (anp([QQ(1, 1)]), [(anp([1])*x + anp([1, 0]), 6)]) + + f *= anp([QQ(2, 1)]) + + assert R.dup_ext_factor(f) == \ + (anp([QQ(2, 1)]), [(anp([1])*x + anp([1, 0]), 2)]) + + assert R.dup_ext_factor(f**3) == \ + (anp([QQ(8, 1)]), [(anp([1])*x + anp([1, 0]), 6)]) + + +def test_dmp_ext_factor(): + K = QQ.algebraic_field(sqrt(2)) + R, x,y = ring("x,y", K) + sqrt2 = K.unit + + def anp(x): + return ANP(x, [QQ(1), QQ(0), QQ(-2)], QQ) + + assert R.dmp_ext_factor(0) == (anp([]), []) + + f = anp([QQ(1)])*x + anp([QQ(1)]) + + assert R.dmp_ext_factor(f) == (anp([QQ(1)]), [(f, 1)]) + + g = anp([QQ(2)])*x + anp([QQ(2)]) + + assert R.dmp_ext_factor(g) == (anp([QQ(2)]), [(f, 1)]) + + f = anp([QQ(1)])*x**2 + anp([QQ(-2)])*y**2 + + assert R.dmp_ext_factor(f) == \ + (anp([QQ(1)]), [(anp([QQ(1)])*x + anp([QQ(-1), QQ(0)])*y, 1), + (anp([QQ(1)])*x + anp([QQ( 1), QQ(0)])*y, 1)]) + + f = anp([QQ(2)])*x**2 + anp([QQ(-4)])*y**2 + + assert R.dmp_ext_factor(f) == \ + (anp([QQ(2)]), [(anp([QQ(1)])*x + anp([QQ(-1), QQ(0)])*y, 1), + (anp([QQ(1)])*x + anp([QQ( 1), QQ(0)])*y, 1)]) + + f1 = y + 1 + f2 = y + sqrt2 + f3 = x**2 + x + 2 + 3*sqrt2 + f = f1**2 * f2**2 * f3**2 + assert R.dmp_ext_factor(f) == (K.one, [(f1, 2), (f2, 2), (f3, 2)]) + + +def test_dup_factor_list(): + R, x = ring("x", ZZ) + assert R.dup_factor_list(0) == (0, []) + assert R.dup_factor_list(7) == (7, []) + + R, x = ring("x", QQ) + assert R.dup_factor_list(0) == (0, []) + assert R.dup_factor_list(QQ(1, 7)) == (QQ(1, 7), []) + + R, x = ring("x", ZZ['t']) + assert R.dup_factor_list(0) == (0, []) + assert R.dup_factor_list(7) == (7, []) + + R, x = ring("x", QQ['t']) + assert R.dup_factor_list(0) == (0, []) + assert R.dup_factor_list(QQ(1, 7)) == (QQ(1, 7), []) + + R, x = ring("x", ZZ) + assert R.dup_factor_list_include(0) == [(0, 1)] + assert R.dup_factor_list_include(7) == [(7, 1)] + + assert R.dup_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)]) + assert R.dup_factor_list_include(x**2 + 2*x + 1) == [(x + 1, 2)] + # issue 8037 + assert R.dup_factor_list(6*x**2 - 5*x - 6) == (1, [(2*x - 3, 1), (3*x + 2, 1)]) + + R, x = ring("x", QQ) + assert R.dup_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1, 2), [(x + 1, 2)]) + + R, x = ring("x", FF(2)) + assert R.dup_factor_list(x**2 + 1) == (1, [(x + 1, 2)]) + + R, x = ring("x", RR) + assert R.dup_factor_list(1.0*x**2 + 2.0*x + 1.0) == (1.0, [(1.0*x + 1.0, 2)]) + assert R.dup_factor_list(2.0*x**2 + 4.0*x + 2.0) == (2.0, [(1.0*x + 1.0, 2)]) + + f = 6.7225336055071*x**2 - 10.6463972754741*x - 0.33469524022264 + coeff, factors = R.dup_factor_list(f) + assert coeff == RR(10.6463972754741) + assert len(factors) == 1 + assert factors[0][0].max_norm() == RR(1.0) + assert factors[0][1] == 1 + + Rt, t = ring("t", ZZ) + R, x = ring("x", Rt) + + f = 4*t*x**2 + 4*t**2*x + + assert R.dup_factor_list(f) == \ + (4*t, [(x, 1), + (x + t, 1)]) + + Rt, t = ring("t", QQ) + R, x = ring("x", Rt) + + f = QQ(1, 2)*t*x**2 + QQ(1, 2)*t**2*x + + assert R.dup_factor_list(f) == \ + (QQ(1, 2)*t, [(x, 1), + (x + t, 1)]) + + R, x = ring("x", QQ.algebraic_field(I)) + def anp(element): + return ANP(element, [QQ(1), QQ(0), QQ(1)], QQ) + + f = anp([QQ(1, 1)])*x**4 + anp([QQ(2, 1)])*x**2 + + assert R.dup_factor_list(f) == \ + (anp([QQ(1, 1)]), [(anp([QQ(1, 1)])*x, 2), + (anp([QQ(1, 1)])*x**2 + anp([])*x + anp([QQ(2, 1)]), 1)]) + + R, x = ring("x", EX) + raises(DomainError, lambda: R.dup_factor_list(EX(sin(1)))) + + +def test_dmp_factor_list(): + R, x, y = ring("x,y", ZZ) + assert R.dmp_factor_list(0) == (ZZ(0), []) + assert R.dmp_factor_list(7) == (7, []) + + R, x, y = ring("x,y", QQ) + assert R.dmp_factor_list(0) == (QQ(0), []) + assert R.dmp_factor_list(QQ(1, 7)) == (QQ(1, 7), []) + + Rt, t = ring("t", ZZ) + R, x, y = ring("x,y", Rt) + assert R.dmp_factor_list(0) == (0, []) + assert R.dmp_factor_list(7) == (ZZ(7), []) + + Rt, t = ring("t", QQ) + R, x, y = ring("x,y", Rt) + assert R.dmp_factor_list(0) == (0, []) + assert R.dmp_factor_list(QQ(1, 7)) == (QQ(1, 7), []) + + R, x, y = ring("x,y", ZZ) + assert R.dmp_factor_list_include(0) == [(0, 1)] + assert R.dmp_factor_list_include(7) == [(7, 1)] + + R, X = xring("x:200", ZZ) + + f, g = X[0]**2 + 2*X[0] + 1, X[0] + 1 + assert R.dmp_factor_list(f) == (1, [(g, 2)]) + + f, g = X[-1]**2 + 2*X[-1] + 1, X[-1] + 1 + assert R.dmp_factor_list(f) == (1, [(g, 2)]) + + R, x = ring("x", ZZ) + assert R.dmp_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)]) + R, x = ring("x", QQ) + assert R.dmp_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1,2), [(x + 1, 2)]) + + R, x, y = ring("x,y", ZZ) + assert R.dmp_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)]) + R, x, y = ring("x,y", QQ) + assert R.dmp_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1,2), [(x + 1, 2)]) + + R, x, y = ring("x,y", ZZ) + f = 4*x**2*y + 4*x*y**2 + + assert R.dmp_factor_list(f) == \ + (4, [(y, 1), + (x, 1), + (x + y, 1)]) + + assert R.dmp_factor_list_include(f) == \ + [(4*y, 1), + (x, 1), + (x + y, 1)] + + R, x, y = ring("x,y", QQ) + f = QQ(1,2)*x**2*y + QQ(1,2)*x*y**2 + + assert R.dmp_factor_list(f) == \ + (QQ(1,2), [(y, 1), + (x, 1), + (x + y, 1)]) + + R, x, y = ring("x,y", RR) + f = 2.0*x**2 - 8.0*y**2 + + assert R.dmp_factor_list(f) == \ + (RR(8.0), [(0.5*x - y, 1), + (0.5*x + y, 1)]) + + f = 6.7225336055071*x**2*y**2 - 10.6463972754741*x*y - 0.33469524022264 + coeff, factors = R.dmp_factor_list(f) + assert coeff == RR(10.6463972754741) + assert len(factors) == 1 + assert factors[0][0].max_norm() == RR(1.0) + assert factors[0][1] == 1 + + Rt, t = ring("t", ZZ) + R, x, y = ring("x,y", Rt) + f = 4*t*x**2 + 4*t**2*x + + assert R.dmp_factor_list(f) == \ + (4*t, [(x, 1), + (x + t, 1)]) + + Rt, t = ring("t", QQ) + R, x, y = ring("x,y", Rt) + f = QQ(1, 2)*t*x**2 + QQ(1, 2)*t**2*x + + assert R.dmp_factor_list(f) == \ + (QQ(1, 2)*t, [(x, 1), + (x + t, 1)]) + + R, x, y = ring("x,y", FF(2)) + raises(NotImplementedError, lambda: R.dmp_factor_list(x**2 + y**2)) + + R, x, y = ring("x,y", EX) + raises(DomainError, lambda: R.dmp_factor_list(EX(sin(1)))) + + +def test_dup_irreducible_p(): + R, x = ring("x", ZZ) + assert R.dup_irreducible_p(x**2 + x + 1) is True + assert R.dup_irreducible_p(x**2 + 2*x + 1) is False + + +def test_dmp_irreducible_p(): + R, x, y = ring("x,y", ZZ) + assert R.dmp_irreducible_p(x**2 + x + 1) is True + assert R.dmp_irreducible_p(x**2 + 2*x + 1) is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_fields.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_fields.py new file mode 100644 index 0000000000000000000000000000000000000000..4f85a00d75dc02ab794ff94c83ba18ddc2023313 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_fields.py @@ -0,0 +1,353 @@ +"""Test sparse rational functions. """ + +from sympy.polys.fields import field, sfield, FracField, FracElement +from sympy.polys.rings import ring +from sympy.polys.domains import ZZ, QQ +from sympy.polys.orderings import lex + +from sympy.testing.pytest import raises, XFAIL +from sympy.core import symbols, E +from sympy.core.numbers import Rational +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt + +def test_FracField___init__(): + F1 = FracField("x,y", ZZ, lex) + F2 = FracField("x,y", ZZ, lex) + F3 = FracField("x,y,z", ZZ, lex) + + assert F1.x == F1.gens[0] + assert F1.y == F1.gens[1] + assert F1.x == F2.x + assert F1.y == F2.y + assert F1.x != F3.x + assert F1.y != F3.y + +def test_FracField___hash__(): + F, x, y, z = field("x,y,z", QQ) + assert hash(F) + +def test_FracField___eq__(): + assert field("x,y,z", QQ)[0] == field("x,y,z", QQ)[0] + assert field("x,y,z", QQ)[0] != field("x,y,z", ZZ)[0] + assert field("x,y,z", ZZ)[0] != field("x,y,z", QQ)[0] + assert field("x,y,z", QQ)[0] != field("x,y", QQ)[0] + assert field("x,y", QQ)[0] != field("x,y,z", QQ)[0] + +def test_sfield(): + x = symbols("x") + + F = FracField((E, exp(exp(x)), exp(x)), ZZ, lex) + e, exex, ex = F.gens + assert sfield(exp(x)*exp(exp(x) + 1 + log(exp(x) + 3)/2)**2/(exp(x) + 3)) \ + == (F, e**2*exex**2*ex) + + F = FracField((x, exp(1/x), log(x), x**QQ(1, 3)), ZZ, lex) + _, ex, lg, x3 = F.gens + assert sfield(((x-3)*log(x)+4*x**2)*exp(1/x+log(x)/3)/x**2) == \ + (F, (4*F.x**2*ex + F.x*ex*lg - 3*ex*lg)/x3**5) + + F = FracField((x, log(x), sqrt(x + log(x))), ZZ, lex) + _, lg, srt = F.gens + assert sfield((x + 1) / (x * (x + log(x))**QQ(3, 2)) - 1/(x * log(x)**2)) \ + == (F, (F.x*lg**2 - F.x*srt + lg**2 - lg*srt)/ + (F.x**2*lg**2*srt + F.x*lg**3*srt)) + +def test_FracElement___hash__(): + F, x, y, z = field("x,y,z", QQ) + assert hash(x*y/z) + +def test_FracElement_copy(): + F, x, y, z = field("x,y,z", ZZ) + + f = x*y/3*z + g = f.copy() + + assert f == g + g.numer[(1, 1, 1)] = 7 + assert f != g + +def test_FracElement_as_expr(): + F, x, y, z = field("x,y,z", ZZ) + f = (3*x**2*y - x*y*z)/(7*z**3 + 1) + + X, Y, Z = F.symbols + g = (3*X**2*Y - X*Y*Z)/(7*Z**3 + 1) + + assert f != g + assert f.as_expr() == g + + X, Y, Z = symbols("x,y,z") + g = (3*X**2*Y - X*Y*Z)/(7*Z**3 + 1) + + assert f != g + assert f.as_expr(X, Y, Z) == g + + raises(ValueError, lambda: f.as_expr(X)) + +def test_FracElement_from_expr(): + x, y, z = symbols("x,y,z") + F, X, Y, Z = field((x, y, z), ZZ) + + f = F.from_expr(1) + assert f == 1 and F.is_element(f) + + f = F.from_expr(Rational(3, 7)) + assert f == F(3)/7 and F.is_element(f) + + f = F.from_expr(x) + assert f == X and F.is_element(f) + + f = F.from_expr(Rational(3,7)*x) + assert f == X*Rational(3, 7) and F.is_element(f) + + f = F.from_expr(1/x) + assert f == 1/X and F.is_element(f) + + f = F.from_expr(x*y*z) + assert f == X*Y*Z and F.is_element(f) + + f = F.from_expr(x*y/z) + assert f == X*Y/Z and F.is_element(f) + + f = F.from_expr(x*y*z + x*y + x) + assert f == X*Y*Z + X*Y + X and F.is_element(f) + + f = F.from_expr((x*y*z + x*y + x)/(x*y + 7)) + assert f == (X*Y*Z + X*Y + X)/(X*Y + 7) and F.is_element(f) + + f = F.from_expr(x**3*y*z + x**2*y**7 + 1) + assert f == X**3*Y*Z + X**2*Y**7 + 1 and F.is_element(f) + + raises(ValueError, lambda: F.from_expr(2**x)) + raises(ValueError, lambda: F.from_expr(7*x + sqrt(2))) + + assert isinstance(ZZ[2**x].get_field().convert(2**(-x)), + FracElement) + assert isinstance(ZZ[x**2].get_field().convert(x**(-6)), + FracElement) + assert isinstance(ZZ[exp(Rational(1, 3))].get_field().convert(E), + FracElement) + + +def test_FracField_nested(): + a, b, x = symbols('a b x') + F1 = ZZ.frac_field(a, b) + F2 = F1.frac_field(x) + frac = F2(a + b) + assert frac.numer == F1.poly_ring(x)(a + b) + assert frac.numer.coeffs() == [F1(a + b)] + assert frac.denom == F1.poly_ring(x)(1) + + F3 = ZZ.poly_ring(a, b) + F4 = F3.frac_field(x) + frac = F4(a + b) + assert frac.numer == F3.poly_ring(x)(a + b) + assert frac.numer.coeffs() == [F3(a + b)] + assert frac.denom == F3.poly_ring(x)(1) + + frac = F2(F3(a + b)) + assert frac.numer == F1.poly_ring(x)(a + b) + assert frac.numer.coeffs() == [F1(a + b)] + assert frac.denom == F1.poly_ring(x)(1) + + frac = F4(F1(a + b)) + assert frac.numer == F3.poly_ring(x)(a + b) + assert frac.numer.coeffs() == [F3(a + b)] + assert frac.denom == F3.poly_ring(x)(1) + + +def test_FracElement__lt_le_gt_ge__(): + F, x, y = field("x,y", ZZ) + + assert F(1) < 1/x < 1/x**2 < 1/x**3 + assert F(1) <= 1/x <= 1/x**2 <= 1/x**3 + + assert -7/x < 1/x < 3/x < y/x < 1/x**2 + assert -7/x <= 1/x <= 3/x <= y/x <= 1/x**2 + + assert 1/x**3 > 1/x**2 > 1/x > F(1) + assert 1/x**3 >= 1/x**2 >= 1/x >= F(1) + + assert 1/x**2 > y/x > 3/x > 1/x > -7/x + assert 1/x**2 >= y/x >= 3/x >= 1/x >= -7/x + +def test_FracElement___neg__(): + F, x,y = field("x,y", QQ) + + f = (7*x - 9)/y + g = (-7*x + 9)/y + + assert -f == g + assert -g == f + +def test_FracElement___add__(): + F, x,y = field("x,y", QQ) + + f, g = 1/x, 1/y + assert f + g == g + f == (x + y)/(x*y) + + assert x + F.ring.gens[0] == F.ring.gens[0] + x == 2*x + + F, x,y = field("x,y", ZZ) + assert x + 3 == 3 + x + assert x + QQ(3,7) == QQ(3,7) + x == (7*x + 3)/7 + + Fuv, u,v = field("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Fuv) + + f = (u*v + x)/(y + u*v) + assert dict(f.numer) == {(1, 0, 0, 0): 1, (0, 0, 0, 0): u*v} + assert dict(f.denom) == {(0, 1, 0, 0): 1, (0, 0, 0, 0): u*v} + + Ruv, u,v = ring("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Ruv) + + f = (u*v + x)/(y + u*v) + assert dict(f.numer) == {(1, 0, 0, 0): 1, (0, 0, 0, 0): u*v} + assert dict(f.denom) == {(0, 1, 0, 0): 1, (0, 0, 0, 0): u*v} + +def test_FracElement___sub__(): + F, x,y = field("x,y", QQ) + + f, g = 1/x, 1/y + assert f - g == (-x + y)/(x*y) + + assert x - F.ring.gens[0] == F.ring.gens[0] - x == 0 + + F, x,y = field("x,y", ZZ) + assert x - 3 == -(3 - x) + assert x - QQ(3,7) == -(QQ(3,7) - x) == (7*x - 3)/7 + + Fuv, u,v = field("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Fuv) + + f = (u*v - x)/(y - u*v) + assert dict(f.numer) == {(1, 0, 0, 0):-1, (0, 0, 0, 0): u*v} + assert dict(f.denom) == {(0, 1, 0, 0): 1, (0, 0, 0, 0):-u*v} + + Ruv, u,v = ring("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Ruv) + + f = (u*v - x)/(y - u*v) + assert dict(f.numer) == {(1, 0, 0, 0):-1, (0, 0, 0, 0): u*v} + assert dict(f.denom) == {(0, 1, 0, 0): 1, (0, 0, 0, 0):-u*v} + +def test_FracElement___mul__(): + F, x,y = field("x,y", QQ) + + f, g = 1/x, 1/y + assert f*g == g*f == 1/(x*y) + + assert x*F.ring.gens[0] == F.ring.gens[0]*x == x**2 + + F, x,y = field("x,y", ZZ) + assert x*3 == 3*x + assert x*QQ(3,7) == QQ(3,7)*x == x*Rational(3, 7) + + Fuv, u,v = field("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Fuv) + + f = ((u + 1)*x*y + 1)/((v - 1)*z - t*u*v - 1) + assert dict(f.numer) == {(1, 1, 0, 0): u + 1, (0, 0, 0, 0): 1} + assert dict(f.denom) == {(0, 0, 1, 0): v - 1, (0, 0, 0, 1): -u*v, (0, 0, 0, 0): -1} + + Ruv, u,v = ring("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Ruv) + + f = ((u + 1)*x*y + 1)/((v - 1)*z - t*u*v - 1) + assert dict(f.numer) == {(1, 1, 0, 0): u + 1, (0, 0, 0, 0): 1} + assert dict(f.denom) == {(0, 0, 1, 0): v - 1, (0, 0, 0, 1): -u*v, (0, 0, 0, 0): -1} + +def test_FracElement___truediv__(): + F, x,y = field("x,y", QQ) + + f, g = 1/x, 1/y + assert f/g == y/x + + assert x/F.ring.gens[0] == F.ring.gens[0]/x == 1 + + F, x,y = field("x,y", ZZ) + assert x*3 == 3*x + assert x/QQ(3,7) == (QQ(3,7)/x)**-1 == x*Rational(7, 3) + + raises(ZeroDivisionError, lambda: x/0) + raises(ZeroDivisionError, lambda: 1/(x - x)) + raises(ZeroDivisionError, lambda: x/(x - x)) + + Fuv, u,v = field("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Fuv) + + f = (u*v)/(x*y) + assert dict(f.numer) == {(0, 0, 0, 0): u*v} + assert dict(f.denom) == {(1, 1, 0, 0): 1} + + g = (x*y)/(u*v) + assert dict(g.numer) == {(1, 1, 0, 0): 1} + assert dict(g.denom) == {(0, 0, 0, 0): u*v} + + Ruv, u,v = ring("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Ruv) + + f = (u*v)/(x*y) + assert dict(f.numer) == {(0, 0, 0, 0): u*v} + assert dict(f.denom) == {(1, 1, 0, 0): 1} + + g = (x*y)/(u*v) + assert dict(g.numer) == {(1, 1, 0, 0): 1} + assert dict(g.denom) == {(0, 0, 0, 0): u*v} + +def test_FracElement___pow__(): + F, x,y = field("x,y", QQ) + + f, g = 1/x, 1/y + + assert f**3 == 1/x**3 + assert g**3 == 1/y**3 + + assert (f*g)**3 == 1/(x**3*y**3) + assert (f*g)**-3 == (x*y)**3 + + raises(ZeroDivisionError, lambda: (x - x)**-3) + +def test_FracElement_diff(): + F, x,y,z = field("x,y,z", ZZ) + + assert ((x**2 + y)/(z + 1)).diff(x) == 2*x/(z + 1) + +@XFAIL +def test_FracElement___call__(): + F, x,y,z = field("x,y,z", ZZ) + f = (x**2 + 3*y)/z + + r = f(1, 1, 1) + assert r == 4 and not isinstance(r, FracElement) + raises(ZeroDivisionError, lambda: f(1, 1, 0)) + +def test_FracElement_evaluate(): + F, x,y,z = field("x,y,z", ZZ) + Fyz = field("y,z", ZZ)[0] + f = (x**2 + 3*y)/z + + assert f.evaluate(x, 0) == 3*Fyz.y/Fyz.z + raises(ZeroDivisionError, lambda: f.evaluate(z, 0)) + +def test_FracElement_subs(): + F, x,y,z = field("x,y,z", ZZ) + f = (x**2 + 3*y)/z + + assert f.subs(x, 0) == 3*y/z + raises(ZeroDivisionError, lambda: f.subs(z, 0)) + +def test_FracElement_compose(): + pass + +def test_FracField_index(): + a = symbols("a") + F, x, y, z = field('x y z', QQ) + assert F.index(x) == 0 + assert F.index(y) == 1 + + raises(ValueError, lambda: F.index(1)) + raises(ValueError, lambda: F.index(a)) + pass diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_galoistools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_galoistools.py new file mode 100644 index 0000000000000000000000000000000000000000..e512bdd865c300bb138cb40b4ff78f393b323c22 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_galoistools.py @@ -0,0 +1,875 @@ +from sympy.polys.galoistools import ( + gf_crt, gf_crt1, gf_crt2, gf_int, + gf_degree, gf_strip, gf_trunc, gf_normal, + gf_from_dict, gf_to_dict, + gf_from_int_poly, gf_to_int_poly, + gf_neg, gf_add_ground, gf_sub_ground, gf_mul_ground, + gf_add, gf_sub, gf_add_mul, gf_sub_mul, gf_mul, gf_sqr, + gf_div, gf_rem, gf_quo, gf_exquo, + gf_lshift, gf_rshift, gf_expand, + gf_pow, gf_pow_mod, + gf_gcdex, gf_gcd, gf_lcm, gf_cofactors, + gf_LC, gf_TC, gf_monic, + gf_eval, gf_multi_eval, + gf_compose, gf_compose_mod, + gf_trace_map, + gf_diff, + gf_irreducible, gf_irreducible_p, + gf_irred_p_ben_or, gf_irred_p_rabin, + gf_sqf_list, gf_sqf_part, gf_sqf_p, + gf_Qmatrix, gf_Qbasis, + gf_ddf_zassenhaus, gf_ddf_shoup, + gf_edf_zassenhaus, gf_edf_shoup, + gf_berlekamp, + gf_factor_sqf, gf_factor, + gf_value, linear_congruence, _csolve_prime_las_vegas, + csolve_prime, gf_csolve, gf_frobenius_map, gf_frobenius_monomial_base +) + +from sympy.polys.polyerrors import ( + ExactQuotientFailed, +) + +from sympy.polys import polyconfig as config + +from sympy.polys.domains import ZZ +from sympy.core.numbers import pi +from sympy.ntheory.generate import nextprime +from sympy.testing.pytest import raises + + +def test_gf_crt(): + U = [49, 76, 65] + M = [99, 97, 95] + + p = 912285 + u = 639985 + + assert gf_crt(U, M, ZZ) == u + + E = [9215, 9405, 9603] + S = [62, 24, 12] + + assert gf_crt1(M, ZZ) == (p, E, S) + assert gf_crt2(U, M, p, E, S, ZZ) == u + + +def test_gf_int(): + assert gf_int(0, 5) == 0 + assert gf_int(1, 5) == 1 + assert gf_int(2, 5) == 2 + assert gf_int(3, 5) == -2 + assert gf_int(4, 5) == -1 + assert gf_int(5, 5) == 0 + + +def test_gf_degree(): + assert gf_degree([]) == -1 + assert gf_degree([1]) == 0 + assert gf_degree([1, 0]) == 1 + assert gf_degree([1, 0, 0, 0, 1]) == 4 + + +def test_gf_strip(): + assert gf_strip([]) == [] + assert gf_strip([0]) == [] + assert gf_strip([0, 0, 0]) == [] + + assert gf_strip([1]) == [1] + assert gf_strip([0, 1]) == [1] + assert gf_strip([0, 0, 0, 1]) == [1] + + assert gf_strip([1, 2, 0]) == [1, 2, 0] + assert gf_strip([0, 1, 2, 0]) == [1, 2, 0] + assert gf_strip([0, 0, 0, 1, 2, 0]) == [1, 2, 0] + + +def test_gf_trunc(): + assert gf_trunc([], 11) == [] + assert gf_trunc([1], 11) == [1] + assert gf_trunc([22], 11) == [] + assert gf_trunc([12], 11) == [1] + + assert gf_trunc([11, 22, 17, 1, 0], 11) == [6, 1, 0] + assert gf_trunc([12, 23, 17, 1, 0], 11) == [1, 1, 6, 1, 0] + + +def test_gf_normal(): + assert gf_normal([11, 22, 17, 1, 0], 11, ZZ) == [6, 1, 0] + + +def test_gf_from_to_dict(): + f = {11: 12, 6: 2, 0: 25} + F = {11: 1, 6: 2, 0: 3} + g = [1, 0, 0, 0, 0, 2, 0, 0, 0, 0, 0, 3] + + assert gf_from_dict(f, 11, ZZ) == g + assert gf_to_dict(g, 11) == F + + f = {11: -5, 4: 0, 3: 1, 0: 12} + F = {11: -5, 3: 1, 0: 1} + g = [6, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 1] + + assert gf_from_dict(f, 11, ZZ) == g + assert gf_to_dict(g, 11) == F + + assert gf_to_dict([10], 11, symmetric=True) == {0: -1} + assert gf_to_dict([10], 11, symmetric=False) == {0: 10} + + +def test_gf_from_to_int_poly(): + assert gf_from_int_poly([1, 0, 7, 2, 20], 5) == [1, 0, 2, 2, 0] + assert gf_to_int_poly([1, 0, 4, 2, 3], 5) == [1, 0, -1, 2, -2] + + assert gf_to_int_poly([10], 11, symmetric=True) == [-1] + assert gf_to_int_poly([10], 11, symmetric=False) == [10] + + +def test_gf_LC(): + assert gf_LC([], ZZ) == 0 + assert gf_LC([1], ZZ) == 1 + assert gf_LC([1, 2], ZZ) == 1 + + +def test_gf_TC(): + assert gf_TC([], ZZ) == 0 + assert gf_TC([1], ZZ) == 1 + assert gf_TC([1, 2], ZZ) == 2 + + +def test_gf_monic(): + assert gf_monic(ZZ.map([]), 11, ZZ) == (0, []) + + assert gf_monic(ZZ.map([1]), 11, ZZ) == (1, [1]) + assert gf_monic(ZZ.map([2]), 11, ZZ) == (2, [1]) + + assert gf_monic(ZZ.map([1, 2, 3, 4]), 11, ZZ) == (1, [1, 2, 3, 4]) + assert gf_monic(ZZ.map([2, 3, 4, 5]), 11, ZZ) == (2, [1, 7, 2, 8]) + + +def test_gf_arith(): + assert gf_neg([], 11, ZZ) == [] + assert gf_neg([1], 11, ZZ) == [10] + assert gf_neg([1, 2, 3], 11, ZZ) == [10, 9, 8] + + assert gf_add_ground([], 0, 11, ZZ) == [] + assert gf_sub_ground([], 0, 11, ZZ) == [] + + assert gf_add_ground([], 3, 11, ZZ) == [3] + assert gf_sub_ground([], 3, 11, ZZ) == [8] + + assert gf_add_ground([1], 3, 11, ZZ) == [4] + assert gf_sub_ground([1], 3, 11, ZZ) == [9] + + assert gf_add_ground([8], 3, 11, ZZ) == [] + assert gf_sub_ground([3], 3, 11, ZZ) == [] + + assert gf_add_ground([1, 2, 3], 3, 11, ZZ) == [1, 2, 6] + assert gf_sub_ground([1, 2, 3], 3, 11, ZZ) == [1, 2, 0] + + assert gf_mul_ground([], 0, 11, ZZ) == [] + assert gf_mul_ground([], 1, 11, ZZ) == [] + + assert gf_mul_ground([1], 0, 11, ZZ) == [] + assert gf_mul_ground([1], 1, 11, ZZ) == [1] + + assert gf_mul_ground([1, 2, 3], 0, 11, ZZ) == [] + assert gf_mul_ground([1, 2, 3], 1, 11, ZZ) == [1, 2, 3] + assert gf_mul_ground([1, 2, 3], 7, 11, ZZ) == [7, 3, 10] + + assert gf_add([], [], 11, ZZ) == [] + assert gf_add([1], [], 11, ZZ) == [1] + assert gf_add([], [1], 11, ZZ) == [1] + assert gf_add([1], [1], 11, ZZ) == [2] + assert gf_add([1], [2], 11, ZZ) == [3] + + assert gf_add([1, 2], [1], 11, ZZ) == [1, 3] + assert gf_add([1], [1, 2], 11, ZZ) == [1, 3] + + assert gf_add([1, 2, 3], [8, 9, 10], 11, ZZ) == [9, 0, 2] + + assert gf_sub([], [], 11, ZZ) == [] + assert gf_sub([1], [], 11, ZZ) == [1] + assert gf_sub([], [1], 11, ZZ) == [10] + assert gf_sub([1], [1], 11, ZZ) == [] + assert gf_sub([1], [2], 11, ZZ) == [10] + + assert gf_sub([1, 2], [1], 11, ZZ) == [1, 1] + assert gf_sub([1], [1, 2], 11, ZZ) == [10, 10] + + assert gf_sub([3, 2, 1], [8, 9, 10], 11, ZZ) == [6, 4, 2] + + assert gf_add_mul( + [1, 5, 6], [7, 3], [8, 0, 6, 1], 11, ZZ) == [1, 2, 10, 8, 9] + assert gf_sub_mul( + [1, 5, 6], [7, 3], [8, 0, 6, 1], 11, ZZ) == [10, 9, 3, 2, 3] + + assert gf_mul([], [], 11, ZZ) == [] + assert gf_mul([], [1], 11, ZZ) == [] + assert gf_mul([1], [], 11, ZZ) == [] + assert gf_mul([1], [1], 11, ZZ) == [1] + assert gf_mul([5], [7], 11, ZZ) == [2] + + assert gf_mul([3, 0, 0, 6, 1, 2], [4, 0, 1, 0], 11, ZZ) == [1, 0, + 3, 2, 4, 3, 1, 2, 0] + assert gf_mul([4, 0, 1, 0], [3, 0, 0, 6, 1, 2], 11, ZZ) == [1, 0, + 3, 2, 4, 3, 1, 2, 0] + + assert gf_mul([2, 0, 0, 1, 7], [2, 0, 0, 1, 7], 11, ZZ) == [4, 0, + 0, 4, 6, 0, 1, 3, 5] + + assert gf_sqr([], 11, ZZ) == [] + assert gf_sqr([2], 11, ZZ) == [4] + assert gf_sqr([1, 2], 11, ZZ) == [1, 4, 4] + + assert gf_sqr([2, 0, 0, 1, 7], 11, ZZ) == [4, 0, 0, 4, 6, 0, 1, 3, 5] + + +def test_gf_division(): + raises(ZeroDivisionError, lambda: gf_div([1, 2, 3], [], 11, ZZ)) + raises(ZeroDivisionError, lambda: gf_rem([1, 2, 3], [], 11, ZZ)) + raises(ZeroDivisionError, lambda: gf_quo([1, 2, 3], [], 11, ZZ)) + raises(ZeroDivisionError, lambda: gf_quo([1, 2, 3], [], 11, ZZ)) + + assert gf_div([1], [1, 2, 3], 7, ZZ) == ([], [1]) + assert gf_rem([1], [1, 2, 3], 7, ZZ) == [1] + assert gf_quo([1], [1, 2, 3], 7, ZZ) == [] + + f = ZZ.map([5, 4, 3, 2, 1, 0]) + g = ZZ.map([1, 2, 3]) + q = [5, 1, 0, 6] + r = [3, 3] + + assert gf_div(f, g, 7, ZZ) == (q, r) + assert gf_rem(f, g, 7, ZZ) == r + assert gf_quo(f, g, 7, ZZ) == q + + raises(ExactQuotientFailed, lambda: gf_exquo(f, g, 7, ZZ)) + + f = ZZ.map([5, 4, 3, 2, 1, 0]) + g = ZZ.map([1, 2, 3, 0]) + q = [5, 1, 0] + r = [6, 1, 0] + + assert gf_div(f, g, 7, ZZ) == (q, r) + assert gf_rem(f, g, 7, ZZ) == r + assert gf_quo(f, g, 7, ZZ) == q + + raises(ExactQuotientFailed, lambda: gf_exquo(f, g, 7, ZZ)) + + assert gf_quo(ZZ.map([1, 2, 1]), ZZ.map([1, 1]), 11, ZZ) == [1, 1] + + +def test_gf_shift(): + f = [1, 2, 3, 4, 5] + + assert gf_lshift([], 5, ZZ) == [] + assert gf_rshift([], 5, ZZ) == ([], []) + + assert gf_lshift(f, 1, ZZ) == [1, 2, 3, 4, 5, 0] + assert gf_lshift(f, 2, ZZ) == [1, 2, 3, 4, 5, 0, 0] + + assert gf_rshift(f, 0, ZZ) == (f, []) + assert gf_rshift(f, 1, ZZ) == ([1, 2, 3, 4], [5]) + assert gf_rshift(f, 3, ZZ) == ([1, 2], [3, 4, 5]) + assert gf_rshift(f, 5, ZZ) == ([], f) + + +def test_gf_expand(): + F = [([1, 1], 2), ([1, 2], 3)] + + assert gf_expand(F, 11, ZZ) == [1, 8, 3, 5, 6, 8] + assert gf_expand((4, F), 11, ZZ) == [4, 10, 1, 9, 2, 10] + + +def test_gf_powering(): + assert gf_pow([1, 0, 0, 1, 8], 0, 11, ZZ) == [1] + assert gf_pow([1, 0, 0, 1, 8], 1, 11, ZZ) == [1, 0, 0, 1, 8] + assert gf_pow([1, 0, 0, 1, 8], 2, 11, ZZ) == [1, 0, 0, 2, 5, 0, 1, 5, 9] + + assert gf_pow([1, 0, 0, 1, 8], 5, 11, ZZ) == \ + [1, 0, 0, 5, 7, 0, 10, 6, 2, 10, 9, 6, 10, 6, 6, 0, 5, 2, 5, 9, 10] + + assert gf_pow([1, 0, 0, 1, 8], 8, 11, ZZ) == \ + [1, 0, 0, 8, 9, 0, 6, 8, 10, 1, 2, 5, 10, 7, 7, 9, 1, 2, 0, 0, 6, 2, + 5, 2, 5, 7, 7, 9, 10, 10, 7, 5, 5] + + assert gf_pow([1, 0, 0, 1, 8], 45, 11, ZZ) == \ + [ 1, 0, 0, 1, 8, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, + 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 4, 0, 0, 4, 10, 0, 0, 0, 0, 0, 0, + 10, 0, 0, 10, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, + 6, 0, 0, 6, 4, 0, 0, 0, 0, 0, 0, 8, 0, 0, 8, 9, 0, 0, 0, 0, 0, 0, + 10, 0, 0, 10, 3, 0, 0, 0, 0, 0, 0, 4, 0, 0, 4, 10, 0, 0, 0, 0, 0, 0, + 8, 0, 0, 8, 9, 0, 0, 0, 0, 0, 0, 9, 0, 0, 9, 6, 0, 0, 0, 0, 0, 0, + 3, 0, 0, 3, 2, 0, 0, 0, 0, 0, 0, 10, 0, 0, 10, 3, 0, 0, 0, 0, 0, 0, + 10, 0, 0, 10, 3, 0, 0, 0, 0, 0, 0, 2, 0, 0, 2, 5, 0, 0, 0, 0, 0, 0, + 4, 0, 0, 4, 10] + + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 0, ZZ.map([2, 0, 7]), 11, ZZ) == [1] + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 1, ZZ.map([2, 0, 7]), 11, ZZ) == [1, 1] + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 2, ZZ.map([2, 0, 7]), 11, ZZ) == [2, 3] + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 5, ZZ.map([2, 0, 7]), 11, ZZ) == [7, 8] + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 8, ZZ.map([2, 0, 7]), 11, ZZ) == [1, 5] + assert gf_pow_mod(ZZ.map([1, 0, 0, 1, 8]), 45, ZZ.map([2, 0, 7]), 11, ZZ) == [5, 4] + + +def test_gf_gcdex(): + assert gf_gcdex(ZZ.map([]), ZZ.map([]), 11, ZZ) == ([1], [], []) + assert gf_gcdex(ZZ.map([2]), ZZ.map([]), 11, ZZ) == ([6], [], [1]) + assert gf_gcdex(ZZ.map([]), ZZ.map([2]), 11, ZZ) == ([], [6], [1]) + assert gf_gcdex(ZZ.map([2]), ZZ.map([2]), 11, ZZ) == ([], [6], [1]) + + assert gf_gcdex(ZZ.map([]), ZZ.map([3, 0]), 11, ZZ) == ([], [4], [1, 0]) + assert gf_gcdex(ZZ.map([3, 0]), ZZ.map([]), 11, ZZ) == ([4], [], [1, 0]) + + assert gf_gcdex(ZZ.map([3, 0]), ZZ.map([3, 0]), 11, ZZ) == ([], [4], [1, 0]) + + assert gf_gcdex(ZZ.map([1, 8, 7]), ZZ.map([1, 7, 1, 7]), 11, ZZ) == ([5, 6], [6], [1, 7]) + + +def test_gf_gcd(): + assert gf_gcd(ZZ.map([]), ZZ.map([]), 11, ZZ) == [] + assert gf_gcd(ZZ.map([2]), ZZ.map([]), 11, ZZ) == [1] + assert gf_gcd(ZZ.map([]), ZZ.map([2]), 11, ZZ) == [1] + assert gf_gcd(ZZ.map([2]), ZZ.map([2]), 11, ZZ) == [1] + + assert gf_gcd(ZZ.map([]), ZZ.map([1, 0]), 11, ZZ) == [1, 0] + assert gf_gcd(ZZ.map([1, 0]), ZZ.map([]), 11, ZZ) == [1, 0] + + assert gf_gcd(ZZ.map([3, 0]), ZZ.map([3, 0]), 11, ZZ) == [1, 0] + assert gf_gcd(ZZ.map([1, 8, 7]), ZZ.map([1, 7, 1, 7]), 11, ZZ) == [1, 7] + + +def test_gf_lcm(): + assert gf_lcm(ZZ.map([]), ZZ.map([]), 11, ZZ) == [] + assert gf_lcm(ZZ.map([2]), ZZ.map([]), 11, ZZ) == [] + assert gf_lcm(ZZ.map([]), ZZ.map([2]), 11, ZZ) == [] + assert gf_lcm(ZZ.map([2]), ZZ.map([2]), 11, ZZ) == [1] + + assert gf_lcm(ZZ.map([]), ZZ.map([1, 0]), 11, ZZ) == [] + assert gf_lcm(ZZ.map([1, 0]), ZZ.map([]), 11, ZZ) == [] + + assert gf_lcm(ZZ.map([3, 0]), ZZ.map([3, 0]), 11, ZZ) == [1, 0] + assert gf_lcm(ZZ.map([1, 8, 7]), ZZ.map([1, 7, 1, 7]), 11, ZZ) == [1, 8, 8, 8, 7] + + +def test_gf_cofactors(): + assert gf_cofactors(ZZ.map([]), ZZ.map([]), 11, ZZ) == ([], [], []) + assert gf_cofactors(ZZ.map([2]), ZZ.map([]), 11, ZZ) == ([1], [2], []) + assert gf_cofactors(ZZ.map([]), ZZ.map([2]), 11, ZZ) == ([1], [], [2]) + assert gf_cofactors(ZZ.map([2]), ZZ.map([2]), 11, ZZ) == ([1], [2], [2]) + + assert gf_cofactors(ZZ.map([]), ZZ.map([1, 0]), 11, ZZ) == ([1, 0], [], [1]) + assert gf_cofactors(ZZ.map([1, 0]), ZZ.map([]), 11, ZZ) == ([1, 0], [1], []) + + assert gf_cofactors(ZZ.map([3, 0]), ZZ.map([3, 0]), 11, ZZ) == ( + [1, 0], [3], [3]) + assert gf_cofactors(ZZ.map([1, 8, 7]), ZZ.map([1, 7, 1, 7]), 11, ZZ) == ( + ([1, 7], [1, 1], [1, 0, 1])) + + +def test_gf_diff(): + assert gf_diff([], 11, ZZ) == [] + assert gf_diff([7], 11, ZZ) == [] + + assert gf_diff([7, 3], 11, ZZ) == [7] + assert gf_diff([7, 3, 1], 11, ZZ) == [3, 3] + + assert gf_diff([1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1], 11, ZZ) == [] + + +def test_gf_eval(): + assert gf_eval([], 4, 11, ZZ) == 0 + assert gf_eval([], 27, 11, ZZ) == 0 + assert gf_eval([7], 4, 11, ZZ) == 7 + assert gf_eval([7], 27, 11, ZZ) == 7 + + assert gf_eval([1, 0, 3, 2, 4, 3, 1, 2, 0], 0, 11, ZZ) == 0 + assert gf_eval([1, 0, 3, 2, 4, 3, 1, 2, 0], 4, 11, ZZ) == 9 + assert gf_eval([1, 0, 3, 2, 4, 3, 1, 2, 0], 27, 11, ZZ) == 5 + + assert gf_eval([4, 0, 0, 4, 6, 0, 1, 3, 5], 0, 11, ZZ) == 5 + assert gf_eval([4, 0, 0, 4, 6, 0, 1, 3, 5], 4, 11, ZZ) == 3 + assert gf_eval([4, 0, 0, 4, 6, 0, 1, 3, 5], 27, 11, ZZ) == 9 + + assert gf_multi_eval([3, 2, 1], [0, 1, 2, 3], 11, ZZ) == [1, 6, 6, 1] + + +def test_gf_compose(): + assert gf_compose([], [1, 0], 11, ZZ) == [] + assert gf_compose_mod([], [1, 0], [1, 0], 11, ZZ) == [] + + assert gf_compose([1], [], 11, ZZ) == [1] + assert gf_compose([1, 0], [], 11, ZZ) == [] + assert gf_compose([1, 0], [1, 0], 11, ZZ) == [1, 0] + + f = ZZ.map([1, 1, 4, 9, 1]) + g = ZZ.map([1, 1, 1]) + h = ZZ.map([1, 0, 0, 2]) + + assert gf_compose(g, h, 11, ZZ) == [1, 0, 0, 5, 0, 0, 7] + assert gf_compose_mod(g, h, f, 11, ZZ) == [3, 9, 6, 10] + + +def test_gf_trace_map(): + f = ZZ.map([1, 1, 4, 9, 1]) + a = [1, 1, 1] + c = ZZ.map([1, 0]) + b = gf_pow_mod(c, 11, f, 11, ZZ) + + assert gf_trace_map(a, b, c, 0, f, 11, ZZ) == \ + ([1, 1, 1], [1, 1, 1]) + assert gf_trace_map(a, b, c, 1, f, 11, ZZ) == \ + ([5, 2, 10, 3], [5, 3, 0, 4]) + assert gf_trace_map(a, b, c, 2, f, 11, ZZ) == \ + ([5, 9, 5, 3], [10, 1, 5, 7]) + assert gf_trace_map(a, b, c, 3, f, 11, ZZ) == \ + ([1, 10, 6, 0], [7]) + assert gf_trace_map(a, b, c, 4, f, 11, ZZ) == \ + ([1, 1, 1], [1, 1, 8]) + assert gf_trace_map(a, b, c, 5, f, 11, ZZ) == \ + ([5, 2, 10, 3], [5, 3, 0, 0]) + assert gf_trace_map(a, b, c, 11, f, 11, ZZ) == \ + ([1, 10, 6, 0], [10]) + + +def test_gf_irreducible(): + assert gf_irreducible_p(gf_irreducible(1, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(2, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(3, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(4, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(5, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(6, 11, ZZ), 11, ZZ) is True + assert gf_irreducible_p(gf_irreducible(7, 11, ZZ), 11, ZZ) is True + + +def test_gf_irreducible_p(): + assert gf_irred_p_ben_or(ZZ.map([7]), 11, ZZ) is True + assert gf_irred_p_ben_or(ZZ.map([7, 3]), 11, ZZ) is True + assert gf_irred_p_ben_or(ZZ.map([7, 3, 1]), 11, ZZ) is False + + assert gf_irred_p_rabin(ZZ.map([7]), 11, ZZ) is True + assert gf_irred_p_rabin(ZZ.map([7, 3]), 11, ZZ) is True + assert gf_irred_p_rabin(ZZ.map([7, 3, 1]), 11, ZZ) is False + + config.setup('GF_IRRED_METHOD', 'ben-or') + + assert gf_irreducible_p(ZZ.map([7]), 11, ZZ) is True + assert gf_irreducible_p(ZZ.map([7, 3]), 11, ZZ) is True + assert gf_irreducible_p(ZZ.map([7, 3, 1]), 11, ZZ) is False + + config.setup('GF_IRRED_METHOD', 'rabin') + + assert gf_irreducible_p(ZZ.map([7]), 11, ZZ) is True + assert gf_irreducible_p(ZZ.map([7, 3]), 11, ZZ) is True + assert gf_irreducible_p(ZZ.map([7, 3, 1]), 11, ZZ) is False + + config.setup('GF_IRRED_METHOD', 'other') + raises(KeyError, lambda: gf_irreducible_p([7], 11, ZZ)) + config.setup('GF_IRRED_METHOD') + + f = ZZ.map([1, 9, 9, 13, 16, 15, 6, 7, 7, 7, 10]) + g = ZZ.map([1, 7, 16, 7, 15, 13, 13, 11, 16, 10, 9]) + + h = gf_mul(f, g, 17, ZZ) + + assert gf_irred_p_ben_or(f, 17, ZZ) is True + assert gf_irred_p_ben_or(g, 17, ZZ) is True + + assert gf_irred_p_ben_or(h, 17, ZZ) is False + + assert gf_irred_p_rabin(f, 17, ZZ) is True + assert gf_irred_p_rabin(g, 17, ZZ) is True + + assert gf_irred_p_rabin(h, 17, ZZ) is False + + +def test_gf_squarefree(): + assert gf_sqf_list([], 11, ZZ) == (0, []) + assert gf_sqf_list([1], 11, ZZ) == (1, []) + assert gf_sqf_list([1, 1], 11, ZZ) == (1, [([1, 1], 1)]) + + assert gf_sqf_p([], 11, ZZ) is True + assert gf_sqf_p([1], 11, ZZ) is True + assert gf_sqf_p([1, 1], 11, ZZ) is True + + f = gf_from_dict({11: 1, 0: 1}, 11, ZZ) + + assert gf_sqf_p(f, 11, ZZ) is False + + assert gf_sqf_list(f, 11, ZZ) == \ + (1, [([1, 1], 11)]) + + f = [1, 5, 8, 4] + + assert gf_sqf_p(f, 11, ZZ) is False + + assert gf_sqf_list(f, 11, ZZ) == \ + (1, [([1, 1], 1), + ([1, 2], 2)]) + + assert gf_sqf_part(f, 11, ZZ) == [1, 3, 2] + + f = [1, 0, 0, 2, 0, 0, 2, 0, 0, 1, 0] + + assert gf_sqf_list(f, 3, ZZ) == \ + (1, [([1, 0], 1), + ([1, 1], 3), + ([1, 2], 6)]) + +def test_gf_frobenius_map(): + f = ZZ.map([2, 0, 1, 0, 2, 2, 0, 2, 2, 2]) + g = ZZ.map([1,1,0,2,0,1,0,2,0,1]) + p = 3 + b = gf_frobenius_monomial_base(g, p, ZZ) + h = gf_frobenius_map(f, g, b, p, ZZ) + h1 = gf_pow_mod(f, p, g, p, ZZ) + assert h == h1 + + +def test_gf_berlekamp(): + f = gf_from_int_poly([1, -3, 1, -3, -1, -3, 1], 11) + + Q = [[1, 0, 0, 0, 0, 0], + [3, 5, 8, 8, 6, 5], + [3, 6, 6, 1, 10, 0], + [9, 4, 10, 3, 7, 9], + [7, 8, 10, 0, 0, 8], + [8, 10, 7, 8, 10, 8]] + + V = [[1, 0, 0, 0, 0, 0], + [0, 1, 1, 1, 1, 0], + [0, 0, 7, 9, 0, 1]] + + assert gf_Qmatrix(f, 11, ZZ) == Q + assert gf_Qbasis(Q, 11, ZZ) == V + + assert gf_berlekamp(f, 11, ZZ) == \ + [[1, 1], [1, 5, 3], [1, 2, 3, 4]] + + f = ZZ.map([1, 0, 1, 0, 10, 10, 8, 2, 8]) + + Q = ZZ.map([[1, 0, 0, 0, 0, 0, 0, 0], + [2, 1, 7, 11, 10, 12, 5, 11], + [3, 6, 4, 3, 0, 4, 7, 2], + [4, 3, 6, 5, 1, 6, 2, 3], + [2, 11, 8, 8, 3, 1, 3, 11], + [6, 11, 8, 6, 2, 7, 10, 9], + [5, 11, 7, 10, 0, 11, 7, 12], + [3, 3, 12, 5, 0, 11, 9, 12]]) + + V = [[1, 0, 0, 0, 0, 0, 0, 0], + [0, 5, 5, 0, 9, 5, 1, 0], + [0, 9, 11, 9, 10, 12, 0, 1]] + + assert gf_Qmatrix(f, 13, ZZ) == Q + assert gf_Qbasis(Q, 13, ZZ) == V + + assert gf_berlekamp(f, 13, ZZ) == \ + [[1, 3], [1, 8, 4, 12], [1, 2, 3, 4, 6]] + + +def test_gf_ddf(): + f = gf_from_dict({15: ZZ(1), 0: ZZ(-1)}, 11, ZZ) + g = [([1, 0, 0, 0, 0, 10], 1), + ([1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 1], 2)] + + assert gf_ddf_zassenhaus(f, 11, ZZ) == g + assert gf_ddf_shoup(f, 11, ZZ) == g + + f = gf_from_dict({63: ZZ(1), 0: ZZ(1)}, 2, ZZ) + g = [([1, 1], 1), + ([1, 1, 1], 2), + ([1, 1, 1, 1, 1, 1, 1], 3), + ([1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, 0, 0, + 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, + 0, 0, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1], 6)] + + assert gf_ddf_zassenhaus(f, 2, ZZ) == g + assert gf_ddf_shoup(f, 2, ZZ) == g + + f = gf_from_dict({6: ZZ(1), 5: ZZ(-1), 4: ZZ(1), 3: ZZ(1), 1: ZZ(-1)}, 3, ZZ) + g = [([1, 1, 0], 1), + ([1, 1, 0, 1, 2], 2)] + + assert gf_ddf_zassenhaus(f, 3, ZZ) == g + assert gf_ddf_shoup(f, 3, ZZ) == g + + f = ZZ.map([1, 2, 5, 26, 677, 436, 791, 325, 456, 24, 577]) + g = [([1, 701], 1), + ([1, 110, 559, 532, 694, 151, 110, 70, 735, 122], 9)] + + assert gf_ddf_zassenhaus(f, 809, ZZ) == g + assert gf_ddf_shoup(f, 809, ZZ) == g + + p = ZZ(nextprime(int((2**15 * pi).evalf()))) + f = gf_from_dict({15: 1, 1: 1, 0: 1}, p, ZZ) + g = [([1, 22730, 68144], 2), + ([1, 64876, 83977, 10787, 12561, 68608, 52650, 88001, 84356], 4), + ([1, 15347, 95022, 84569, 94508, 92335], 5)] + + assert gf_ddf_zassenhaus(f, p, ZZ) == g + assert gf_ddf_shoup(f, p, ZZ) == g + + +def test_gf_edf(): + f = ZZ.map([1, 1, 0, 1, 2]) + g = ZZ.map([[1, 0, 1], [1, 1, 2]]) + + assert gf_edf_zassenhaus(f, 2, 3, ZZ) == g + assert gf_edf_shoup(f, 2, 3, ZZ) == g + + +def test_issue_23174(): + f = ZZ.map([1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]) + g = ZZ.map([[1, 0, 0, 1, 1, 1, 0, 0, 1], [1, 1, 1, 0, 1, 0, 1, 1, 1]]) + + assert gf_edf_zassenhaus(f, 8, 2, ZZ) == g + + +def test_gf_factor(): + assert gf_factor([], 11, ZZ) == (0, []) + assert gf_factor([1], 11, ZZ) == (1, []) + assert gf_factor([1, 1], 11, ZZ) == (1, [([1, 1], 1)]) + + assert gf_factor_sqf([], 11, ZZ) == (0, []) + assert gf_factor_sqf([1], 11, ZZ) == (1, []) + assert gf_factor_sqf([1, 1], 11, ZZ) == (1, [[1, 1]]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + + assert gf_factor_sqf([], 11, ZZ) == (0, []) + assert gf_factor_sqf([1], 11, ZZ) == (1, []) + assert gf_factor_sqf([1, 1], 11, ZZ) == (1, [[1, 1]]) + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + + assert gf_factor_sqf([], 11, ZZ) == (0, []) + assert gf_factor_sqf([1], 11, ZZ) == (1, []) + assert gf_factor_sqf([1, 1], 11, ZZ) == (1, [[1, 1]]) + + config.setup('GF_FACTOR_METHOD', 'shoup') + + assert gf_factor_sqf(ZZ.map([]), 11, ZZ) == (0, []) + assert gf_factor_sqf(ZZ.map([1]), 11, ZZ) == (1, []) + assert gf_factor_sqf(ZZ.map([1, 1]), 11, ZZ) == (1, [[1, 1]]) + + f, p = ZZ.map([1, 0, 0, 1, 0]), 2 + + g = (1, [([1, 0], 1), + ([1, 1], 1), + ([1, 1, 1], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + g = (1, [[1, 0], + [1, 1], + [1, 1, 1]]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor_sqf(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor_sqf(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor_sqf(f, p, ZZ) == g + + f, p = gf_from_int_poly([1, -3, 1, -3, -1, -3, 1], 11), 11 + + g = (1, [([1, 1], 1), + ([1, 5, 3], 1), + ([1, 2, 3, 4], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + f, p = [1, 5, 8, 4], 11 + + g = (1, [([1, 1], 1), ([1, 2], 2)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + f, p = [1, 1, 10, 1, 0, 10, 10, 10, 0, 0], 11 + + g = (1, [([1, 0], 2), ([1, 9, 5], 1), ([1, 3, 0, 8, 5, 2], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + f, p = gf_from_dict({32: 1, 0: 1}, 11, ZZ), 11 + + g = (1, [([1, 0, 0, 0, 0, 0, 0, 0, 3, 0, 0, 0, 0, 0, 0, 0, 10], 1), + ([1, 0, 0, 0, 0, 0, 0, 0, 8, 0, 0, 0, 0, 0, 0, 0, 10], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + f, p = gf_from_dict({32: ZZ(8), 0: ZZ(5)}, 11, ZZ), 11 + + g = (8, [([1, 3], 1), + ([1, 8], 1), + ([1, 0, 9], 1), + ([1, 2, 2], 1), + ([1, 9, 2], 1), + ([1, 0, 5, 0, 7], 1), + ([1, 0, 6, 0, 7], 1), + ([1, 0, 0, 0, 1, 0, 0, 0, 6], 1), + ([1, 0, 0, 0, 10, 0, 0, 0, 6], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + f, p = gf_from_dict({63: ZZ(8), 0: ZZ(5)}, 11, ZZ), 11 + + g = (8, [([1, 7], 1), + ([1, 4, 5], 1), + ([1, 6, 8, 2], 1), + ([1, 9, 9, 2], 1), + ([1, 0, 0, 9, 0, 0, 4], 1), + ([1, 2, 0, 8, 4, 6, 4], 1), + ([1, 2, 3, 8, 0, 6, 4], 1), + ([1, 2, 6, 0, 8, 4, 4], 1), + ([1, 3, 3, 1, 6, 8, 4], 1), + ([1, 5, 6, 0, 8, 6, 4], 1), + ([1, 6, 2, 7, 9, 8, 4], 1), + ([1, 10, 4, 7, 10, 7, 4], 1), + ([1, 10, 10, 1, 4, 9, 4], 1)]) + + config.setup('GF_FACTOR_METHOD', 'berlekamp') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + # Gathen polynomials: x**n + x + 1 (mod p > 2**n * pi) + + p = ZZ(nextprime(int((2**15 * pi).evalf()))) + f = gf_from_dict({15: 1, 1: 1, 0: 1}, p, ZZ) + + assert gf_sqf_p(f, p, ZZ) is True + + g = (1, [([1, 22730, 68144], 1), + ([1, 81553, 77449, 86810, 4724], 1), + ([1, 86276, 56779, 14859, 31575], 1), + ([1, 15347, 95022, 84569, 94508, 92335], 1)]) + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + g = (1, [[1, 22730, 68144], + [1, 81553, 77449, 86810, 4724], + [1, 86276, 56779, 14859, 31575], + [1, 15347, 95022, 84569, 94508, 92335]]) + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor_sqf(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor_sqf(f, p, ZZ) == g + + # Shoup polynomials: f = a_0 x**n + a_1 x**(n-1) + ... + a_n + # (mod p > 2**(n-2) * pi), where a_n = a_{n-1}**2 + 1, a_0 = 1 + + p = ZZ(nextprime(int((2**4 * pi).evalf()))) + f = ZZ.map([1, 2, 5, 26, 41, 39, 38]) + + assert gf_sqf_p(f, p, ZZ) is True + + g = (1, [([1, 44, 26], 1), + ([1, 11, 25, 18, 30], 1)]) + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor(f, p, ZZ) == g + + g = (1, [[1, 44, 26], + [1, 11, 25, 18, 30]]) + + config.setup('GF_FACTOR_METHOD', 'zassenhaus') + assert gf_factor_sqf(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'shoup') + assert gf_factor_sqf(f, p, ZZ) == g + + config.setup('GF_FACTOR_METHOD', 'other') + raises(KeyError, lambda: gf_factor([1, 1], 11, ZZ)) + config.setup('GF_FACTOR_METHOD') + + +def test_gf_csolve(): + assert gf_value([1, 7, 2, 4], 11) == 2204 + + assert linear_congruence(4, 3, 5) == [2] + assert linear_congruence(0, 3, 5) == [] + assert linear_congruence(6, 1, 4) == [] + assert linear_congruence(0, 5, 5) == [0, 1, 2, 3, 4] + assert linear_congruence(3, 12, 15) == [4, 9, 14] + assert linear_congruence(6, 0, 18) == [0, 3, 6, 9, 12, 15] + # _csolve_prime_las_vegas + assert _csolve_prime_las_vegas([2, 3, 1], 5) == [2, 4] + assert _csolve_prime_las_vegas([2, 0, 1], 5) == [] + from sympy.ntheory import primerange + for p in primerange(2, 100): + # f = x**(p-1) - 1 + f = gf_sub_ground(gf_pow([1, 0], p - 1, p, ZZ), 1, p, ZZ) + assert _csolve_prime_las_vegas(f, p) == list(range(1, p)) + # with power = 1 + assert csolve_prime([1, 3, 2, 17], 7) == [3] + assert csolve_prime([1, 3, 1, 5], 5) == [0, 1] + assert csolve_prime([3, 6, 9, 3], 3) == [0, 1, 2] + # with power > 1 + assert csolve_prime( + [1, 1, 223], 3, 4) == [4, 13, 22, 31, 40, 49, 58, 67, 76] + assert csolve_prime([3, 5, 2, 25], 5, 3) == [16, 50, 99] + assert csolve_prime([3, 2, 2, 49], 7, 3) == [147, 190, 234] + + assert gf_csolve([1, 1, 7], 189) == [13, 49, 76, 112, 139, 175] + assert gf_csolve([1, 3, 4, 1, 30], 60) == [10, 30] + assert gf_csolve([1, 1, 7], 15) == [] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_groebnertools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_groebnertools.py new file mode 100644 index 0000000000000000000000000000000000000000..b7d0fc112047ac26f67d096db02eb8a1c91cab89 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_groebnertools.py @@ -0,0 +1,533 @@ +"""Tests for Groebner bases. """ + +from sympy.polys.groebnertools import ( + groebner, sig, sig_key, + lbp, lbp_key, critical_pair, + cp_key, is_rewritable_or_comparable, + Sign, Polyn, Num, s_poly, f5_reduce, + groebner_lcm, groebner_gcd, is_groebner, + is_reduced +) + +from sympy.polys.fglmtools import _representing_matrices +from sympy.polys.orderings import lex, grlex + +from sympy.polys.rings import ring, xring +from sympy.polys.domains import ZZ, QQ + +from sympy.testing.pytest import slow +from sympy.polys import polyconfig as config + +def _do_test_groebner(): + R, x,y = ring("x,y", QQ, lex) + f = x**2 + 2*x*y**2 + g = x*y + 2*y**3 - 1 + + assert groebner([f, g], R) == [x, y**3 - QQ(1,2)] + + R, y,x = ring("y,x", QQ, lex) + f = 2*x**2*y + y**2 + g = 2*x**3 + x*y - 1 + + assert groebner([f, g], R) == [y, x**3 - QQ(1,2)] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = x - z**2 + g = y - z**3 + + assert groebner([f, g], R) == [f, g] + + R, x,y = ring("x,y", QQ, grlex) + f = x**3 - 2*x*y + g = x**2*y + x - 2*y**2 + + assert groebner([f, g], R) == [x**2, x*y, -QQ(1,2)*x + y**2] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = -x**2 + y + g = -x**3 + z + + assert groebner([f, g], R) == [x**2 - y, x*y - z, x*z - y**2, y**3 - z**2] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = -x**2 + y + g = -x**3 + z + + assert groebner([f, g], R) == [y**3 - z**2, x**2 - y, x*y - z, x*z - y**2] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = -x**2 + z + g = -x**3 + y + + assert groebner([f, g], R) == [x**2 - z, x*y - z**2, x*z - y, y**2 - z**3] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = -x**2 + z + g = -x**3 + y + + assert groebner([f, g], R) == [-y**2 + z**3, x**2 - z, x*y - z**2, x*z - y] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = x - y**2 + g = -y**3 + z + + assert groebner([f, g], R) == [x - y**2, y**3 - z] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = x - y**2 + g = -y**3 + z + + assert groebner([f, g], R) == [x**2 - y*z, x*y - z, -x + y**2] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = x - z**2 + g = y - z**3 + + assert groebner([f, g], R) == [x - z**2, y - z**3] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = x - z**2 + g = y - z**3 + + assert groebner([f, g], R) == [x**2 - y*z, x*z - y, -x + z**2] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = -y**2 + z + g = x - y**3 + + assert groebner([f, g], R) == [x - y*z, y**2 - z] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = -y**2 + z + g = x - y**3 + + assert groebner([f, g], R) == [-x**2 + z**3, x*y - z**2, y**2 - z, -x + y*z] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = y - z**2 + g = x - z**3 + + assert groebner([f, g], R) == [x - z**3, y - z**2] + + R, x,y,z = ring("x,y,z", QQ, grlex) + f = y - z**2 + g = x - z**3 + + assert groebner([f, g], R) == [-x**2 + y**3, x*z - y**2, -x + y*z, -y + z**2] + + R, x,y,z = ring("x,y,z", QQ, lex) + f = 4*x**2*y**2 + 4*x*y + 1 + g = x**2 + y**2 - 1 + + assert groebner([f, g], R) == [ + x - 4*y**7 + 8*y**5 - 7*y**3 + 3*y, + y**8 - 2*y**6 + QQ(3,2)*y**4 - QQ(1,2)*y**2 + QQ(1,16), + ] + +def test_groebner_buchberger(): + with config.using(groebner='buchberger'): + _do_test_groebner() + +def test_groebner_f5b(): + with config.using(groebner='f5b'): + _do_test_groebner() + +def _do_test_benchmark_minpoly(): + R, x,y,z = ring("x,y,z", QQ, lex) + + F = [x**3 + x + 1, y**2 + y + 1, (x + y) * z - (x**2 + y)] + G = [x + QQ(155,2067)*z**5 - QQ(355,689)*z**4 + QQ(6062,2067)*z**3 - QQ(3687,689)*z**2 + QQ(6878,2067)*z - QQ(25,53), + y + QQ(4,53)*z**5 - QQ(91,159)*z**4 + QQ(523,159)*z**3 - QQ(387,53)*z**2 + QQ(1043,159)*z - QQ(308,159), + z**6 - 7*z**5 + 41*z**4 - 82*z**3 + 89*z**2 - 46*z + 13] + + assert groebner(F, R) == G + +def test_benchmark_minpoly_buchberger(): + with config.using(groebner='buchberger'): + _do_test_benchmark_minpoly() + +def test_benchmark_minpoly_f5b(): + with config.using(groebner='f5b'): + _do_test_benchmark_minpoly() + + +def test_benchmark_coloring(): + V = range(1, 12 + 1) + E = [(1, 2), (2, 3), (1, 4), (1, 6), (1, 12), (2, 5), (2, 7), (3, 8), (3, 10), + (4, 11), (4, 9), (5, 6), (6, 7), (7, 8), (8, 9), (9, 10), (10, 11), + (11, 12), (5, 12), (5, 9), (6, 10), (7, 11), (8, 12), (3, 4)] + + R, V = xring([ "x%d" % v for v in V ], QQ, lex) + E = [(V[i - 1], V[j - 1]) for i, j in E] + + x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12 = V + + I3 = [x**3 - 1 for x in V] + Ig = [x**2 + x*y + y**2 for x, y in E] + + I = I3 + Ig + + assert groebner(I[:-1], R) == [ + x1 + x11 + x12, + x2 - x11, + x3 - x12, + x4 - x12, + x5 + x11 + x12, + x6 - x11, + x7 - x12, + x8 + x11 + x12, + x9 - x11, + x10 + x11 + x12, + x11**2 + x11*x12 + x12**2, + x12**3 - 1, + ] + + assert groebner(I, R) == [1] + + +def _do_test_benchmark_katsura_3(): + R, x0,x1,x2 = ring("x:3", ZZ, lex) + I = [x0 + 2*x1 + 2*x2 - 1, + x0**2 + 2*x1**2 + 2*x2**2 - x0, + 2*x0*x1 + 2*x1*x2 - x1] + + assert groebner(I, R) == [ + -7 + 7*x0 + 8*x2 + 158*x2**2 - 420*x2**3, + 7*x1 + 3*x2 - 79*x2**2 + 210*x2**3, + x2 + x2**2 - 40*x2**3 + 84*x2**4, + ] + + R, x0,x1,x2 = ring("x:3", ZZ, grlex) + I = [ i.set_ring(R) for i in I ] + + assert groebner(I, R) == [ + 7*x1 + 3*x2 - 79*x2**2 + 210*x2**3, + -x1 + x2 - 3*x2**2 + 5*x1**2, + -x1 - 4*x2 + 10*x1*x2 + 12*x2**2, + -1 + x0 + 2*x1 + 2*x2, + ] + +def test_benchmark_katsura3_buchberger(): + with config.using(groebner='buchberger'): + _do_test_benchmark_katsura_3() + +def test_benchmark_katsura3_f5b(): + with config.using(groebner='f5b'): + _do_test_benchmark_katsura_3() + +def _do_test_benchmark_katsura_4(): + R, x0,x1,x2,x3 = ring("x:4", ZZ, lex) + I = [x0 + 2*x1 + 2*x2 + 2*x3 - 1, + x0**2 + 2*x1**2 + 2*x2**2 + 2*x3**2 - x0, + 2*x0*x1 + 2*x1*x2 + 2*x2*x3 - x1, + x1**2 + 2*x0*x2 + 2*x1*x3 - x2] + + assert groebner(I, R) == [ + 5913075*x0 - 159690237696*x3**7 + 31246269696*x3**6 + 27439610544*x3**5 - 6475723368*x3**4 - 838935856*x3**3 + 275119624*x3**2 + 4884038*x3 - 5913075, + 1971025*x1 - 97197721632*x3**7 + 73975630752*x3**6 - 12121915032*x3**5 - 2760941496*x3**4 + 814792828*x3**3 - 1678512*x3**2 - 9158924*x3, + 5913075*x2 + 371438283744*x3**7 - 237550027104*x3**6 + 22645939824*x3**5 + 11520686172*x3**4 - 2024910556*x3**3 - 132524276*x3**2 + 30947828*x3, + 128304*x3**8 - 93312*x3**7 + 15552*x3**6 + 3144*x3**5 - + 1120*x3**4 + 36*x3**3 + 15*x3**2 - x3, + ] + + R, x0,x1,x2,x3 = ring("x:4", ZZ, grlex) + I = [ i.set_ring(R) for i in I ] + + assert groebner(I, R) == [ + 393*x1 - 4662*x2**2 + 4462*x2*x3 - 59*x2 + 224532*x3**4 - 91224*x3**3 - 678*x3**2 + 2046*x3, + -x1 + 196*x2**3 - 21*x2**2 + 60*x2*x3 - 18*x2 - 168*x3**3 + 83*x3**2 - 9*x3, + -6*x1 + 1134*x2**2*x3 - 189*x2**2 - 466*x2*x3 + 32*x2 - 630*x3**3 + 57*x3**2 + 51*x3, + 33*x1 + 63*x2**2 + 2268*x2*x3**2 - 188*x2*x3 + 34*x2 + 2520*x3**3 - 849*x3**2 + 3*x3, + 7*x1**2 - x1 - 7*x2**2 - 24*x2*x3 + 3*x2 - 15*x3**2 + 5*x3, + 14*x1*x2 - x1 + 14*x2**2 + 18*x2*x3 - 4*x2 + 6*x3**2 - 2*x3, + 14*x1*x3 - x1 + 7*x2**2 + 32*x2*x3 - 4*x2 + 27*x3**2 - 9*x3, + x0 + 2*x1 + 2*x2 + 2*x3 - 1, + ] + +def test_benchmark_kastura_4_buchberger(): + with config.using(groebner='buchberger'): + _do_test_benchmark_katsura_4() + +def test_benchmark_kastura_4_f5b(): + with config.using(groebner='f5b'): + _do_test_benchmark_katsura_4() + +def _do_test_benchmark_czichowski(): + R, x,t = ring("x,t", ZZ, lex) + I = [9*x**8 + 36*x**7 - 32*x**6 - 252*x**5 - 78*x**4 + 468*x**3 + 288*x**2 - 108*x + 9, + (-72 - 72*t)*x**7 + (-256 - 252*t)*x**6 + (192 + 192*t)*x**5 + (1280 + 1260*t)*x**4 + (312 + 312*t)*x**3 + (-404*t)*x**2 + (-576 - 576*t)*x + 96 + 108*t] + + assert groebner(I, R) == [ + 3725588592068034903797967297424801242396746870413359539263038139343329273586196480000*x - + 160420835591776763325581422211936558925462474417709511019228211783493866564923546661604487873*t**7 - + 1406108495478033395547109582678806497509499966197028487131115097902188374051595011248311352864*t**6 - + 5241326875850889518164640374668786338033653548841427557880599579174438246266263602956254030352*t**5 - + 10758917262823299139373269714910672770004760114329943852726887632013485035262879510837043892416*t**4 - + 13119383576444715672578819534846747735372132018341964647712009275306635391456880068261130581248*t**3 - + 9491412317016197146080450036267011389660653495578680036574753839055748080962214787557853941760*t**2 - + 3767520915562795326943800040277726397326609797172964377014046018280260848046603967211258368000*t - + 632314652371226552085897259159210286886724229880266931574701654721512325555116066073245696000, + 610733380717522355121*t**8 + + 6243748742141230639968*t**7 + + 27761407182086143225024*t**6 + + 70066148869420956398592*t**5 + + 109701225644313784229376*t**4 + + 109009005495588442152960*t**3 + + 67072101084384786432000*t**2 + + 23339979742629593088000*t + + 3513592776846090240000, + ] + + R, x,t = ring("x,t", ZZ, grlex) + I = [ i.set_ring(R) for i in I ] + + assert groebner(I, R) == [ + 16996618586000601590732959134095643086442*t**3*x - + 32936701459297092865176560282688198064839*t**3 + + 78592411049800639484139414821529525782364*t**2*x - + 120753953358671750165454009478961405619916*t**2 + + 120988399875140799712152158915653654637280*t*x - + 144576390266626470824138354942076045758736*t + + 60017634054270480831259316163620768960*x**2 + + 61976058033571109604821862786675242894400*x - + 56266268491293858791834120380427754600960, + 576689018321912327136790519059646508441672750656050290242749*t**4 + + 2326673103677477425562248201573604572527893938459296513327336*t**3 + + 110743790416688497407826310048520299245819959064297990236000*t**2*x + + 3308669114229100853338245486174247752683277925010505284338016*t**2 + + 323150205645687941261103426627818874426097912639158572428800*t*x + + 1914335199925152083917206349978534224695445819017286960055680*t + + 861662882561803377986838989464278045397192862768588480000*x**2 + + 235296483281783440197069672204341465480107019878814196672000*x + + 361850798943225141738895123621685122544503614946436727532800, + -117584925286448670474763406733005510014188341867*t**3 + + 68566565876066068463853874568722190223721653044*t**2*x - + 435970731348366266878180788833437896139920683940*t**2 + + 196297602447033751918195568051376792491869233408*t*x - + 525011527660010557871349062870980202067479780112*t + + 517905853447200553360289634770487684447317120*x**3 + + 569119014870778921949288951688799397569321920*x**2 + + 138877356748142786670127389526667463202210102080*x - + 205109210539096046121625447192779783475018619520, + -3725142681462373002731339445216700112264527*t**3 + + 583711207282060457652784180668273817487940*t**2*x - + 12381382393074485225164741437227437062814908*t**2 + + 151081054097783125250959636747516827435040*t*x**2 + + 1814103857455163948531448580501928933873280*t*x - + 13353115629395094645843682074271212731433648*t + + 236415091385250007660606958022544983766080*x**2 + + 1390443278862804663728298060085399578417600*x - + 4716885828494075789338754454248931750698880, + ] + +# NOTE: This is very slow (> 2 minutes on 3.4 GHz) without GMPY +@slow +def test_benchmark_czichowski_buchberger(): + with config.using(groebner='buchberger'): + _do_test_benchmark_czichowski() + +def test_benchmark_czichowski_f5b(): + with config.using(groebner='f5b'): + _do_test_benchmark_czichowski() + +def _do_test_benchmark_cyclic_4(): + R, a,b,c,d = ring("a,b,c,d", ZZ, lex) + + I = [a + b + c + d, + a*b + a*d + b*c + b*d, + a*b*c + a*b*d + a*c*d + b*c*d, + a*b*c*d - 1] + + assert groebner(I, R) == [ + 4*a + 3*d**9 - 4*d**5 - 3*d, + 4*b + 4*c - 3*d**9 + 4*d**5 + 7*d, + 4*c**2 + 3*d**10 - 4*d**6 - 3*d**2, + 4*c*d**4 + 4*c - d**9 + 4*d**5 + 5*d, d**12 - d**8 - d**4 + 1 + ] + + R, a,b,c,d = ring("a,b,c,d", ZZ, grlex) + I = [ i.set_ring(R) for i in I ] + + assert groebner(I, R) == [ + 3*b*c - c**2 + d**6 - 3*d**2, + -b + 3*c**2*d**3 - c - d**5 - 4*d, + -b + 3*c*d**4 + 2*c + 2*d**5 + 2*d, + c**4 + 2*c**2*d**2 - d**4 - 2, + c**3*d + c*d**3 + d**4 + 1, + b*c**2 - c**3 - c**2*d - 2*c*d**2 - d**3, + b**2 - c**2, b*d + c**2 + c*d + d**2, + a + b + c + d + ] + +def test_benchmark_cyclic_4_buchberger(): + with config.using(groebner='buchberger'): + _do_test_benchmark_cyclic_4() + +def test_benchmark_cyclic_4_f5b(): + with config.using(groebner='f5b'): + _do_test_benchmark_cyclic_4() + +def test_sig_key(): + s1 = sig((0,) * 3, 2) + s2 = sig((1,) * 3, 4) + s3 = sig((2,) * 3, 2) + + assert sig_key(s1, lex) > sig_key(s2, lex) + assert sig_key(s2, lex) < sig_key(s3, lex) + + +def test_lbp_key(): + R, x,y,z,t = ring("x,y,z,t", ZZ, lex) + + p1 = lbp(sig((0,) * 4, 3), R.zero, 12) + p2 = lbp(sig((0,) * 4, 4), R.zero, 13) + p3 = lbp(sig((0,) * 4, 4), R.zero, 12) + + assert lbp_key(p1) > lbp_key(p2) + assert lbp_key(p2) < lbp_key(p3) + + +def test_critical_pair(): + # from cyclic4 with grlex + R, x,y,z,t = ring("x,y,z,t", QQ, grlex) + + p1 = (((0, 0, 0, 0), 4), y*z*t**2 + z**2*t**2 - t**4 - 1, 4) + q1 = (((0, 0, 0, 0), 2), -y**2 - y*t - z*t - t**2, 2) + + p2 = (((0, 0, 0, 2), 3), z**3*t**2 + z**2*t**3 - z - t, 5) + q2 = (((0, 0, 2, 2), 2), y*z + z*t**5 + z*t + t**6, 13) + + assert critical_pair(p1, q1, R) == ( + ((0, 0, 1, 2), 2), ((0, 0, 1, 2), QQ(-1, 1)), (((0, 0, 0, 0), 2), -y**2 - y*t - z*t - t**2, 2), + ((0, 1, 0, 0), 4), ((0, 1, 0, 0), QQ(1, 1)), (((0, 0, 0, 0), 4), y*z*t**2 + z**2*t**2 - t**4 - 1, 4) + ) + assert critical_pair(p2, q2, R) == ( + ((0, 0, 4, 2), 2), ((0, 0, 2, 0), QQ(1, 1)), (((0, 0, 2, 2), 2), y*z + z*t**5 + z*t + t**6, 13), + ((0, 0, 0, 5), 3), ((0, 0, 0, 3), QQ(1, 1)), (((0, 0, 0, 2), 3), z**3*t**2 + z**2*t**3 - z - t, 5) + ) + +def test_cp_key(): + # from cyclic4 with grlex + R, x,y,z,t = ring("x,y,z,t", QQ, grlex) + + p1 = (((0, 0, 0, 0), 4), y*z*t**2 + z**2*t**2 - t**4 - 1, 4) + q1 = (((0, 0, 0, 0), 2), -y**2 - y*t - z*t - t**2, 2) + + p2 = (((0, 0, 0, 2), 3), z**3*t**2 + z**2*t**3 - z - t, 5) + q2 = (((0, 0, 2, 2), 2), y*z + z*t**5 + z*t + t**6, 13) + + cp1 = critical_pair(p1, q1, R) + cp2 = critical_pair(p2, q2, R) + + assert cp_key(cp1, R) < cp_key(cp2, R) + + cp1 = critical_pair(p1, p2, R) + cp2 = critical_pair(q1, q2, R) + + assert cp_key(cp1, R) < cp_key(cp2, R) + + +def test_is_rewritable_or_comparable(): + # from katsura4 with grlex + R, x,y,z,t = ring("x,y,z,t", QQ, grlex) + + p = lbp(sig((0, 0, 2, 1), 2), R.zero, 2) + B = [lbp(sig((0, 0, 0, 1), 2), QQ(2,45)*y**2 + QQ(1,5)*y*z + QQ(5,63)*y*t + z**2*t + QQ(4,45)*z**2 + QQ(76,35)*z*t**2 - QQ(32,105)*z*t + QQ(13,7)*t**3 - QQ(13,21)*t**2, 6)] + + # rewritable: + assert is_rewritable_or_comparable(Sign(p), Num(p), B) is True + + p = lbp(sig((0, 1, 1, 0), 2), R.zero, 7) + B = [lbp(sig((0, 0, 0, 0), 3), QQ(10,3)*y*z + QQ(4,3)*y*t - QQ(1,3)*y + 4*z**2 + QQ(22,3)*z*t - QQ(4,3)*z + 4*t**2 - QQ(4,3)*t, 3)] + + # comparable: + assert is_rewritable_or_comparable(Sign(p), Num(p), B) is True + + +def test_f5_reduce(): + # katsura3 with lex + R, x,y,z = ring("x,y,z", QQ, lex) + + F = [(((0, 0, 0), 1), x + 2*y + 2*z - 1, 1), + (((0, 0, 0), 2), 6*y**2 + 8*y*z - 2*y + 6*z**2 - 2*z, 2), + (((0, 0, 0), 3), QQ(10,3)*y*z - QQ(1,3)*y + 4*z**2 - QQ(4,3)*z, 3), + (((0, 0, 1), 2), y + 30*z**3 - QQ(79,7)*z**2 + QQ(3,7)*z, 4), + (((0, 0, 2), 2), z**4 - QQ(10,21)*z**3 + QQ(1,84)*z**2 + QQ(1,84)*z, 5)] + + cp = critical_pair(F[0], F[1], R) + s = s_poly(cp) + + assert f5_reduce(s, F) == (((0, 2, 0), 1), R.zero, 1) + + s = lbp(sig(Sign(s)[0], 100), Polyn(s), Num(s)) + assert f5_reduce(s, F) == s + + +def test_representing_matrices(): + R, x,y = ring("x,y", QQ, grlex) + + basis = [(0, 0), (0, 1), (1, 0), (1, 1)] + F = [x**2 - x - 3*y + 1, -2*x + y**2 + y - 1] + + assert _representing_matrices(basis, F, R) == [ + [[QQ(0, 1), QQ(0, 1),-QQ(1, 1), QQ(3, 1)], + [QQ(0, 1), QQ(0, 1), QQ(3, 1),-QQ(4, 1)], + [QQ(1, 1), QQ(0, 1), QQ(1, 1), QQ(6, 1)], + [QQ(0, 1), QQ(1, 1), QQ(0, 1), QQ(1, 1)]], + [[QQ(0, 1), QQ(1, 1), QQ(0, 1),-QQ(2, 1)], + [QQ(1, 1),-QQ(1, 1), QQ(0, 1), QQ(6, 1)], + [QQ(0, 1), QQ(2, 1), QQ(0, 1), QQ(3, 1)], + [QQ(0, 1), QQ(0, 1), QQ(1, 1),-QQ(1, 1)]]] + +def test_groebner_lcm(): + R, x,y,z = ring("x,y,z", ZZ) + + assert groebner_lcm(x**2 - y**2, x - y) == x**2 - y**2 + assert groebner_lcm(2*x**2 - 2*y**2, 2*x - 2*y) == 2*x**2 - 2*y**2 + + R, x,y,z = ring("x,y,z", QQ) + + assert groebner_lcm(x**2 - y**2, x - y) == x**2 - y**2 + assert groebner_lcm(2*x**2 - 2*y**2, 2*x - 2*y) == 2*x**2 - 2*y**2 + + R, x,y = ring("x,y", ZZ) + + assert groebner_lcm(x**2*y, x*y**2) == x**2*y**2 + + f = 2*x*y**5 - 3*x*y**4 - 2*x*y**3 + 3*x*y**2 + g = y**5 - 2*y**3 + y + h = 2*x*y**7 - 3*x*y**6 - 4*x*y**5 + 6*x*y**4 + 2*x*y**3 - 3*x*y**2 + + assert groebner_lcm(f, g) == h + + f = x**3 - 3*x**2*y - 9*x*y**2 - 5*y**3 + g = x**4 + 6*x**3*y + 12*x**2*y**2 + 10*x*y**3 + 3*y**4 + h = x**5 + x**4*y - 18*x**3*y**2 - 50*x**2*y**3 - 47*x*y**4 - 15*y**5 + + assert groebner_lcm(f, g) == h + +def test_groebner_gcd(): + R, x,y,z = ring("x,y,z", ZZ) + + assert groebner_gcd(x**2 - y**2, x - y) == x - y + assert groebner_gcd(2*x**2 - 2*y**2, 2*x - 2*y) == 2*x - 2*y + + R, x,y,z = ring("x,y,z", QQ) + + assert groebner_gcd(x**2 - y**2, x - y) == x - y + assert groebner_gcd(2*x**2 - 2*y**2, 2*x - 2*y) == x - y + +def test_is_groebner(): + R, x,y = ring("x,y", QQ, grlex) + valid_groebner = [x**2, x*y, -QQ(1,2)*x + y**2] + invalid_groebner = [x**3, x*y, -QQ(1,2)*x + y**2] + assert is_groebner(valid_groebner, R) is True + assert is_groebner(invalid_groebner, R) is False + +def test_is_reduced(): + R, x, y = ring("x,y", QQ, lex) + f = x**2 + 2*x*y**2 + g = x*y + 2*y**3 - 1 + assert is_reduced([f, g], R) == False + G = groebner([f, g], R) + assert is_reduced(G, R) == True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_heuristicgcd.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_heuristicgcd.py new file mode 100644 index 0000000000000000000000000000000000000000..7ff6bd6ea4effbd49c5e942ea8925cfcca4ba162 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_heuristicgcd.py @@ -0,0 +1,152 @@ +from sympy.polys.rings import ring +from sympy.polys.domains import ZZ +from sympy.polys.heuristicgcd import heugcd + + +def test_heugcd_univariate_integers(): + R, x = ring("x", ZZ) + + f = x**4 + 8*x**3 + 21*x**2 + 22*x + 8 + g = x**3 + 6*x**2 + 11*x + 6 + + h = x**2 + 3*x + 2 + + cff = x**2 + 5*x + 4 + cfg = x + 3 + + assert heugcd(f, g) == (h, cff, cfg) + + f = x**4 - 4 + g = x**4 + 4*x**2 + 4 + + h = x**2 + 2 + + cff = x**2 - 2 + cfg = x**2 + 2 + + assert heugcd(f, g) == (h, cff, cfg) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + h = 1 + + cff = f + cfg = g + + assert heugcd(f, g) == (h, cff, cfg) + + f = - 352518131239247345597970242177235495263669787845475025293906825864749649589178600387510272*x**49 \ + + 46818041807522713962450042363465092040687472354933295397472942006618953623327997952*x**42 \ + + 378182690892293941192071663536490788434899030680411695933646320291525827756032*x**35 \ + + 112806468807371824947796775491032386836656074179286744191026149539708928*x**28 \ + - 12278371209708240950316872681744825481125965781519138077173235712*x**21 \ + + 289127344604779611146960547954288113529690984687482920704*x**14 \ + + 19007977035740498977629742919480623972236450681*x**7 \ + + 311973482284542371301330321821976049 + + g = 365431878023781158602430064717380211405897160759702125019136*x**21 \ + + 197599133478719444145775798221171663643171734081650688*x**14 \ + - 9504116979659010018253915765478924103928886144*x**7 \ + - 311973482284542371301330321821976049 + + # TODO: assert heugcd(f, f.diff(x))[0] == g + + f = 1317378933230047068160*x + 2945748836994210856960 + g = 120352542776360960*x + 269116466014453760 + + h = 120352542776360960*x + 269116466014453760 + cff = 10946 + cfg = 1 + + assert heugcd(f, g) == (h, cff, cfg) + +def test_heugcd_multivariate_integers(): + R, x, y = ring("x,y", ZZ) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert heugcd(f, g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert heugcd(f, g) == (x + 1, 1, 2*x + 2) + + R, x, y, z, u = ring("x,y,z,u", ZZ) + + f, g = u**2 + 2*u + 1, 2*u + 2 + assert heugcd(f, g) == (u + 1, u + 1, 2) + + f, g = z**2*u**2 + 2*z**2*u + z**2 + z*u + z, u**2 + 2*u + 1 + h, cff, cfg = u + 1, z**2*u + z**2 + z, u + 1 + + assert heugcd(f, g) == (h, cff, cfg) + assert heugcd(g, f) == (h, cfg, cff) + + R, x, y, z = ring("x,y,z", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v, a, b = ring("x,y,z,u,v,a,b", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v, a, b, c, d = ring("x,y,z,u,v,a,b,c,d", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z = ring("x,y,z", ZZ) + + f, g, h = R.fateman_poly_F_2() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + f, g, h = R.fateman_poly_F_3() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, t = ring("x,y,z,t", ZZ) + + f, g, h = R.fateman_poly_F_3() + H, cff, cfg = heugcd(f, g) + + assert H == h and H*cff == f and H*cfg == g + + +def test_issue_10996(): + R, x, y, z = ring("x,y,z", ZZ) + + f = 12*x**6*y**7*z**3 - 3*x**4*y**9*z**3 + 12*x**3*y**5*z**4 + g = -48*x**7*y**8*z**3 + 12*x**5*y**10*z**3 - 48*x**5*y**7*z**2 + \ + 36*x**4*y**7*z - 48*x**4*y**6*z**4 + 12*x**3*y**9*z**2 - 48*x**3*y**4 \ + - 9*x**2*y**9*z - 48*x**2*y**5*z**3 + 12*x*y**6 + 36*x*y**5*z**2 - 48*y**2*z + + H, cff, cfg = heugcd(f, g) + + assert H == 12*x**3*y**4 - 3*x*y**6 + 12*y**2*z + assert H*cff == f and H*cfg == g + + +def test_issue_25793(): + R, x = ring("x", ZZ) + f = x - 4851 # failure starts for values more than 4850 + g = f*(2*x + 1) + H, cff, cfg = R.dup_zz_heu_gcd(f, g) + assert H == f + # needs a test for dmp, too, that fails in master before this change diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_hypothesis.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_hypothesis.py new file mode 100644 index 0000000000000000000000000000000000000000..78c2369179c3f0ea4d34b8a7868417506177e3c5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_hypothesis.py @@ -0,0 +1,36 @@ +from hypothesis import given +from hypothesis import strategies as st +from sympy.abc import x +from sympy.polys.polytools import Poly + + +def polys(*, nonzero=False, domain="ZZ"): + # This is a simple strategy, but sufficient the tests below + elems = {"ZZ": st.integers(), "QQ": st.fractions()} + coeff_st = st.lists(elems[domain]) + if nonzero: + coeff_st = coeff_st.filter(any) + return st.builds(Poly, coeff_st, st.just(x), domain=st.just(domain)) + + +@given(f=polys(), g=polys(), r=polys()) +def test_gcd_hypothesis(f, g, r): + gcd_1 = f.gcd(g) + gcd_2 = g.gcd(f) + assert gcd_1 == gcd_2 + + # multiply by r + gcd_3 = g.gcd(f + r * g) + assert gcd_1 == gcd_3 + + +@given(f_z=polys(), g_z=polys(nonzero=True)) +def test_poly_hypothesis_integers(f_z, g_z): + remainder_z = f_z.rem(g_z) + assert g_z.degree() >= remainder_z.degree() or remainder_z.degree() == 0 + + +@given(f_q=polys(domain="QQ"), g_q=polys(nonzero=True, domain="QQ")) +def test_poly_hypothesis_rationals(f_q, g_q): + remainder_q = f_q.rem(g_q) + assert g_q.degree() >= remainder_q.degree() or remainder_q.degree() == 0 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_injections.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_injections.py new file mode 100644 index 0000000000000000000000000000000000000000..63a5537c94f00e52a3899c97f0d78bfadab78a67 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_injections.py @@ -0,0 +1,39 @@ +"""Tests for functions that inject symbols into the global namespace. """ + +from sympy.polys.rings import vring +from sympy.polys.fields import vfield +from sympy.polys.domains import QQ + +def test_vring(): + ns = {'vring':vring, 'QQ':QQ} + exec('R = vring("r", QQ)', ns) + exec('assert r == R.gens[0]', ns) + + exec('R = vring("rb rbb rcc rzz _rx", QQ)', ns) + exec('assert rb == R.gens[0]', ns) + exec('assert rbb == R.gens[1]', ns) + exec('assert rcc == R.gens[2]', ns) + exec('assert rzz == R.gens[3]', ns) + exec('assert _rx == R.gens[4]', ns) + + exec('R = vring(["rd", "re", "rfg"], QQ)', ns) + exec('assert rd == R.gens[0]', ns) + exec('assert re == R.gens[1]', ns) + exec('assert rfg == R.gens[2]', ns) + +def test_vfield(): + ns = {'vfield':vfield, 'QQ':QQ} + exec('F = vfield("f", QQ)', ns) + exec('assert f == F.gens[0]', ns) + + exec('F = vfield("fb fbb fcc fzz _fx", QQ)', ns) + exec('assert fb == F.gens[0]', ns) + exec('assert fbb == F.gens[1]', ns) + exec('assert fcc == F.gens[2]', ns) + exec('assert fzz == F.gens[3]', ns) + exec('assert _fx == F.gens[4]', ns) + + exec('F = vfield(["fd", "fe", "ffg"], QQ)', ns) + exec('assert fd == F.gens[0]', ns) + exec('assert fe == F.gens[1]', ns) + exec('assert ffg == F.gens[2]', ns) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_modulargcd.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_modulargcd.py new file mode 100644 index 0000000000000000000000000000000000000000..20510f59186524ed4008ade943fab526a9ae7194 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_modulargcd.py @@ -0,0 +1,325 @@ +from sympy.polys.rings import ring +from sympy.polys.domains import ZZ, QQ, AlgebraicField +from sympy.polys.modulargcd import ( + modgcd_univariate, + modgcd_bivariate, + _chinese_remainder_reconstruction_multivariate, + modgcd_multivariate, + _to_ZZ_poly, + _to_ANP_poly, + func_field_modgcd, + _func_field_modgcd_m) +from sympy.functions.elementary.miscellaneous import sqrt + + +def test_modgcd_univariate_integers(): + R, x = ring("x", ZZ) + + f, g = R.zero, R.zero + assert modgcd_univariate(f, g) == (0, 0, 0) + + f, g = R.zero, x + assert modgcd_univariate(f, g) == (x, 0, 1) + assert modgcd_univariate(g, f) == (x, 1, 0) + + f, g = R.zero, -x + assert modgcd_univariate(f, g) == (x, 0, -1) + assert modgcd_univariate(g, f) == (x, -1, 0) + + f, g = 2*x, R(2) + assert modgcd_univariate(f, g) == (2, x, 1) + + f, g = 2*x + 2, 6*x**2 - 6 + assert modgcd_univariate(f, g) == (2*x + 2, 1, 3*x - 3) + + f = x**4 + 8*x**3 + 21*x**2 + 22*x + 8 + g = x**3 + 6*x**2 + 11*x + 6 + + h = x**2 + 3*x + 2 + + cff = x**2 + 5*x + 4 + cfg = x + 3 + + assert modgcd_univariate(f, g) == (h, cff, cfg) + + f = x**4 - 4 + g = x**4 + 4*x**2 + 4 + + h = x**2 + 2 + + cff = x**2 - 2 + cfg = x**2 + 2 + + assert modgcd_univariate(f, g) == (h, cff, cfg) + + f = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + g = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + + h = 1 + + cff = f + cfg = g + + assert modgcd_univariate(f, g) == (h, cff, cfg) + + f = - 352518131239247345597970242177235495263669787845475025293906825864749649589178600387510272*x**49 \ + + 46818041807522713962450042363465092040687472354933295397472942006618953623327997952*x**42 \ + + 378182690892293941192071663536490788434899030680411695933646320291525827756032*x**35 \ + + 112806468807371824947796775491032386836656074179286744191026149539708928*x**28 \ + - 12278371209708240950316872681744825481125965781519138077173235712*x**21 \ + + 289127344604779611146960547954288113529690984687482920704*x**14 \ + + 19007977035740498977629742919480623972236450681*x**7 \ + + 311973482284542371301330321821976049 + + g = 365431878023781158602430064717380211405897160759702125019136*x**21 \ + + 197599133478719444145775798221171663643171734081650688*x**14 \ + - 9504116979659010018253915765478924103928886144*x**7 \ + - 311973482284542371301330321821976049 + + assert modgcd_univariate(f, f.diff(x))[0] == g + + f = 1317378933230047068160*x + 2945748836994210856960 + g = 120352542776360960*x + 269116466014453760 + + h = 120352542776360960*x + 269116466014453760 + cff = 10946 + cfg = 1 + + assert modgcd_univariate(f, g) == (h, cff, cfg) + + +def test_modgcd_bivariate_integers(): + R, x, y = ring("x,y", ZZ) + + f, g = R.zero, R.zero + assert modgcd_bivariate(f, g) == (0, 0, 0) + + f, g = 2*x, R(2) + assert modgcd_bivariate(f, g) == (2, x, 1) + + f, g = x + 2*y, x + y + assert modgcd_bivariate(f, g) == (1, f, g) + + f, g = x**2 + 2*x*y + y**2, x**3 + y**3 + assert modgcd_bivariate(f, g) == (x + y, x + y, x**2 - x*y + y**2) + + f, g = x*y**2 + 2*x*y + x, x*y**3 + x + assert modgcd_bivariate(f, g) == (x*y + x, y + 1, y**2 - y + 1) + + f, g = x**2*y**2 + x**2*y + 1, x*y**2 + x*y + 1 + assert modgcd_bivariate(f, g) == (1, f, g) + + f = 2*x*y**2 + 4*x*y + 2*x + y**2 + 2*y + 1 + g = 2*x*y**3 + 2*x + y**3 + 1 + assert modgcd_bivariate(f, g) == (2*x*y + 2*x + y + 1, y + 1, y**2 - y + 1) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert modgcd_bivariate(f, g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert modgcd_bivariate(f, g) == (x + 1, 1, 2*x + 2) + + f = 2*x**2 + 4*x*y - 2*x - 4*y + g = x**2 + x - 2 + assert modgcd_bivariate(f, g) == (x - 1, 2*x + 4*y, x + 2) + + f = 2*x**2 + 2*x*y - 3*x - 3*y + g = 4*x*y - 2*x + 4*y**2 - 2*y + assert modgcd_bivariate(f, g) == (x + y, 2*x - 3, 4*y - 2) + + +def test_chinese_remainder(): + R, x, y = ring("x, y", ZZ) + p, q = 3, 5 + + hp = x**3*y - x**2 - 1 + hq = -x**3*y - 2*x*y**2 + 2 + + hpq = _chinese_remainder_reconstruction_multivariate(hp, hq, p, q) + + assert hpq.trunc_ground(p) == hp + assert hpq.trunc_ground(q) == hq + + T, z = ring("z", R) + p, q = 3, 7 + + hp = (x*y + 1)*z**2 + x + hq = (x**2 - 3*y)*z + 2 + + hpq = _chinese_remainder_reconstruction_multivariate(hp, hq, p, q) + + assert hpq.trunc_ground(p) == hp + assert hpq.trunc_ground(q) == hq + + +def test_modgcd_multivariate_integers(): + R, x, y = ring("x,y", ZZ) + + f, g = R.zero, R.zero + assert modgcd_multivariate(f, g) == (0, 0, 0) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert modgcd_multivariate(f, g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert modgcd_multivariate(f, g) == (x + 1, 1, 2*x + 2) + + f = 2*x**2 + 2*x*y - 3*x - 3*y + g = 4*x*y - 2*x + 4*y**2 - 2*y + assert modgcd_multivariate(f, g) == (x + y, 2*x - 3, 4*y - 2) + + f, g = x*y**2 + 2*x*y + x, x*y**3 + x + assert modgcd_multivariate(f, g) == (x*y + x, y + 1, y**2 - y + 1) + + f, g = x**2*y**2 + x**2*y + 1, x*y**2 + x*y + 1 + assert modgcd_multivariate(f, g) == (1, f, g) + + f = x**4 + 8*x**3 + 21*x**2 + 22*x + 8 + g = x**3 + 6*x**2 + 11*x + 6 + + h = x**2 + 3*x + 2 + + cff = x**2 + 5*x + 4 + cfg = x + 3 + + assert modgcd_multivariate(f, g) == (h, cff, cfg) + + R, x, y, z, u = ring("x,y,z,u", ZZ) + + f, g = x + y + z, -x - y - z - u + assert modgcd_multivariate(f, g) == (1, f, g) + + f, g = u**2 + 2*u + 1, 2*u + 2 + assert modgcd_multivariate(f, g) == (u + 1, u + 1, 2) + + f, g = z**2*u**2 + 2*z**2*u + z**2 + z*u + z, u**2 + 2*u + 1 + h, cff, cfg = u + 1, z**2*u + z**2 + z, u + 1 + + assert modgcd_multivariate(f, g) == (h, cff, cfg) + assert modgcd_multivariate(g, f) == (h, cfg, cff) + + R, x, y, z = ring("x,y,z", ZZ) + + f, g = x - y*z, x - y*z + assert modgcd_multivariate(f, g) == (x - y*z, 1, 1) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v = ring("x,y,z,u,v", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v, a, b = ring("x,y,z,u,v,a,b", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, u, v, a, b, c, d = ring("x,y,z,u,v,a,b,c,d", ZZ) + + f, g, h = R.fateman_poly_F_1() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z = ring("x,y,z", ZZ) + + f, g, h = R.fateman_poly_F_2() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + f, g, h = R.fateman_poly_F_3() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + R, x, y, z, t = ring("x,y,z,t", ZZ) + + f, g, h = R.fateman_poly_F_3() + H, cff, cfg = modgcd_multivariate(f, g) + + assert H == h and H*cff == f and H*cfg == g + + +def test_to_ZZ_ANP_poly(): + A = AlgebraicField(QQ, sqrt(2)) + R, x = ring("x", A) + f = x*(sqrt(2) + 1) + + T, x_, z_ = ring("x_, z_", ZZ) + f_ = x_*z_ + x_ + + assert _to_ZZ_poly(f, T) == f_ + assert _to_ANP_poly(f_, R) == f + + R, x, t, s = ring("x, t, s", A) + f = x*t**2 + x*s + sqrt(2) + + D, t_, s_ = ring("t_, s_", ZZ) + T, x_, z_ = ring("x_, z_", D) + f_ = (t_**2 + s_)*x_ + z_ + + assert _to_ZZ_poly(f, T) == f_ + assert _to_ANP_poly(f_, R) == f + + +def test_modgcd_algebraic_field(): + A = AlgebraicField(QQ, sqrt(2)) + R, x = ring("x", A) + one = A.one + + f, g = 2*x, R(2) + assert func_field_modgcd(f, g) == (one, f, g) + + f, g = 2*x, R(sqrt(2)) + assert func_field_modgcd(f, g) == (one, f, g) + + f, g = 2*x + 2, 6*x**2 - 6 + assert func_field_modgcd(f, g) == (x + 1, R(2), 6*x - 6) + + R, x, y = ring("x, y", A) + + f, g = x + sqrt(2)*y, x + y + assert func_field_modgcd(f, g) == (one, f, g) + + f, g = x*y + sqrt(2)*y**2, R(sqrt(2))*y + assert func_field_modgcd(f, g) == (y, x + sqrt(2)*y, R(sqrt(2))) + + f, g = x**2 + 2*sqrt(2)*x*y + 2*y**2, x + sqrt(2)*y + assert func_field_modgcd(f, g) == (g, g, one) + + A = AlgebraicField(QQ, sqrt(2), sqrt(3)) + R, x, y, z = ring("x, y, z", A) + + h = x**2*y**7 + sqrt(6)/21*z + f, g = h*(27*y**3 + 1), h*(y + x) + assert func_field_modgcd(f, g) == (h, 27*y**3+1, y+x) + + h = x**13*y**3 + 1/2*x**10 + 1/sqrt(2) + f, g = h*(x + 1), h*sqrt(2)/sqrt(3) + assert func_field_modgcd(f, g) == (h, x + 1, R(sqrt(2)/sqrt(3))) + + A = AlgebraicField(QQ, sqrt(2)**(-1)*sqrt(3)) + R, x = ring("x", A) + + f, g = x + 1, x - 1 + assert func_field_modgcd(f, g) == (A.one, f, g) + + +# when func_field_modgcd supports function fields, this test can be changed +def test_modgcd_func_field(): + D, t = ring("t", ZZ) + R, x, z = ring("x, z", D) + + minpoly = (z**2*t**2 + z**2*t - 1).drop(0) + f, g = x + 1, x - 1 + + assert _func_field_modgcd_m(f, g, minpoly) == R.one diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_monomials.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_monomials.py new file mode 100644 index 0000000000000000000000000000000000000000..c5ed28ba0e8e3f8e9f85c543a4fffcaef855fff8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_monomials.py @@ -0,0 +1,269 @@ +"""Tests for tools and arithmetics for monomials of distributed polynomials. """ + +from sympy.polys.monomials import ( + itermonomials, monomial_count, + monomial_mul, monomial_div, + monomial_gcd, monomial_lcm, + monomial_max, monomial_min, + monomial_divides, monomial_pow, + Monomial, +) + +from sympy.polys.polyerrors import ExactQuotientFailed + +from sympy.abc import a, b, c, x, y, z +from sympy.core import S, symbols +from sympy.testing.pytest import raises + +def test_monomials(): + + # total_degree tests + assert set(itermonomials([], 0)) == {S.One} + assert set(itermonomials([], 1)) == {S.One} + assert set(itermonomials([], 2)) == {S.One} + + assert set(itermonomials([], 0, 0)) == {S.One} + assert set(itermonomials([], 1, 0)) == {S.One} + assert set(itermonomials([], 2, 0)) == {S.One} + + raises(StopIteration, lambda: next(itermonomials([], 0, 1))) + raises(StopIteration, lambda: next(itermonomials([], 0, 2))) + raises(StopIteration, lambda: next(itermonomials([], 0, 3))) + + assert set(itermonomials([], 0, 1)) == set() + assert set(itermonomials([], 0, 2)) == set() + assert set(itermonomials([], 0, 3)) == set() + + raises(ValueError, lambda: set(itermonomials([], -1))) + raises(ValueError, lambda: set(itermonomials([x], -1))) + raises(ValueError, lambda: set(itermonomials([x, y], -1))) + + assert set(itermonomials([x], 0)) == {S.One} + assert set(itermonomials([x], 1)) == {S.One, x} + assert set(itermonomials([x], 2)) == {S.One, x, x**2} + assert set(itermonomials([x], 3)) == {S.One, x, x**2, x**3} + + assert set(itermonomials([x, y], 0)) == {S.One} + assert set(itermonomials([x, y], 1)) == {S.One, x, y} + assert set(itermonomials([x, y], 2)) == {S.One, x, y, x**2, y**2, x*y} + assert set(itermonomials([x, y], 3)) == \ + {S.One, x, y, x**2, x**3, y**2, y**3, x*y, x*y**2, y*x**2} + + i, j, k = symbols('i j k', commutative=False) + assert set(itermonomials([i, j, k], 0)) == {S.One} + assert set(itermonomials([i, j, k], 1)) == {S.One, i, j, k} + assert set(itermonomials([i, j, k], 2)) == \ + {S.One, i, j, k, i**2, j**2, k**2, i*j, i*k, j*i, j*k, k*i, k*j} + + assert set(itermonomials([i, j, k], 3)) == \ + {S.One, i, j, k, i**2, j**2, k**2, i*j, i*k, j*i, j*k, k*i, k*j, + i**3, j**3, k**3, + i**2 * j, i**2 * k, j * i**2, k * i**2, + j**2 * i, j**2 * k, i * j**2, k * j**2, + k**2 * i, k**2 * j, i * k**2, j * k**2, + i*j*i, i*k*i, j*i*j, j*k*j, k*i*k, k*j*k, + i*j*k, i*k*j, j*i*k, j*k*i, k*i*j, k*j*i, + } + + assert set(itermonomials([x, i, j], 0)) == {S.One} + assert set(itermonomials([x, i, j], 1)) == {S.One, x, i, j} + assert set(itermonomials([x, i, j], 2)) == {S.One, x, i, j, x*i, x*j, i*j, j*i, x**2, i**2, j**2} + assert set(itermonomials([x, i, j], 3)) == \ + {S.One, x, i, j, x*i, x*j, i*j, j*i, x**2, i**2, j**2, + x**3, i**3, j**3, + x**2 * i, x**2 * j, + x * i**2, j * i**2, i**2 * j, i*j*i, + x * j**2, i * j**2, j**2 * i, j*i*j, + x * i * j, x * j * i + } + + # degree_list tests + assert set(itermonomials([], [])) == {S.One} + + raises(ValueError, lambda: set(itermonomials([], [0]))) + raises(ValueError, lambda: set(itermonomials([], [1]))) + raises(ValueError, lambda: set(itermonomials([], [2]))) + + raises(ValueError, lambda: set(itermonomials([x], [1], []))) + raises(ValueError, lambda: set(itermonomials([x], [1, 2], []))) + raises(ValueError, lambda: set(itermonomials([x], [1, 2, 3], []))) + + raises(ValueError, lambda: set(itermonomials([x], [], [1]))) + raises(ValueError, lambda: set(itermonomials([x], [], [1, 2]))) + raises(ValueError, lambda: set(itermonomials([x], [], [1, 2, 3]))) + + raises(ValueError, lambda: set(itermonomials([x, y], [1, 2], [1, 2, 3]))) + raises(ValueError, lambda: set(itermonomials([x, y, z], [1, 2, 3], [0, 1]))) + + raises(ValueError, lambda: set(itermonomials([x], [1], [-1]))) + raises(ValueError, lambda: set(itermonomials([x, y], [1, 2], [1, -1]))) + + raises(ValueError, lambda: set(itermonomials([], [], 1))) + raises(ValueError, lambda: set(itermonomials([], [], 2))) + raises(ValueError, lambda: set(itermonomials([], [], 3))) + + raises(ValueError, lambda: set(itermonomials([x, y], [0, 1], [1, 2]))) + raises(ValueError, lambda: set(itermonomials([x, y, z], [0, 0, 3], [0, 1, 2]))) + + assert set(itermonomials([x], [0])) == {S.One} + assert set(itermonomials([x], [1])) == {S.One, x} + assert set(itermonomials([x], [2])) == {S.One, x, x**2} + assert set(itermonomials([x], [3])) == {S.One, x, x**2, x**3} + + assert set(itermonomials([x], [3], [1])) == {x, x**3, x**2} + assert set(itermonomials([x], [3], [2])) == {x**3, x**2} + + assert set(itermonomials([x, y], 3, 3)) == {x**3, x**2*y, x*y**2, y**3} + assert set(itermonomials([x, y], 3, 2)) == {x**2, x*y, y**2, x**3, x**2*y, x*y**2, y**3} + + assert set(itermonomials([x, y], [0, 0])) == {S.One} + assert set(itermonomials([x, y], [0, 1])) == {S.One, y} + assert set(itermonomials([x, y], [0, 2])) == {S.One, y, y**2} + assert set(itermonomials([x, y], [0, 2], [0, 1])) == {y, y**2} + assert set(itermonomials([x, y], [0, 2], [0, 2])) == {y**2} + + assert set(itermonomials([x, y], [1, 0])) == {S.One, x} + assert set(itermonomials([x, y], [1, 1])) == {S.One, x, y, x*y} + assert set(itermonomials([x, y], [1, 2])) == {S.One, x, y, x*y, y**2, x*y**2} + assert set(itermonomials([x, y], [1, 2], [1, 1])) == {x*y, x*y**2} + assert set(itermonomials([x, y], [1, 2], [1, 2])) == {x*y**2} + + assert set(itermonomials([x, y], [2, 0])) == {S.One, x, x**2} + assert set(itermonomials([x, y], [2, 1])) == {S.One, x, y, x*y, x**2, x**2*y} + assert set(itermonomials([x, y], [2, 2])) == \ + {S.One, y**2, x*y**2, x, x*y, x**2, x**2*y**2, y, x**2*y} + + i, j, k = symbols('i j k', commutative=False) + assert set(itermonomials([i, j, k], 2, 2)) == \ + {k*i, i**2, i*j, j*k, j*i, k**2, j**2, k*j, i*k} + assert set(itermonomials([i, j, k], 3, 2)) == \ + {j*k**2, i*k**2, k*i*j, k*i**2, k**2, j*k*j, k*j**2, i*k*i, i*j, + j**2*k, i**2*j, j*i*k, j**3, i**3, k*j*i, j*k*i, j*i, + k**2*j, j*i**2, k*j, k*j*k, i*j*i, j*i*j, i*j**2, j**2, + k*i*k, i**2, j*k, i*k, i*k*j, k**3, i**2*k, j**2*i, k**2*i, + i*j*k, k*i + } + assert set(itermonomials([i, j, k], [0, 0, 0])) == {S.One} + assert set(itermonomials([i, j, k], [0, 0, 1])) == {1, k} + assert set(itermonomials([i, j, k], [0, 1, 0])) == {1, j} + assert set(itermonomials([i, j, k], [1, 0, 0])) == {i, 1} + assert set(itermonomials([i, j, k], [0, 0, 2])) == {k**2, 1, k} + assert set(itermonomials([i, j, k], [0, 2, 0])) == {1, j, j**2} + assert set(itermonomials([i, j, k], [2, 0, 0])) == {i, 1, i**2} + assert set(itermonomials([i, j, k], [1, 1, 1])) == {1, k, j, j*k, i*k, i, i*j, i*j*k} + assert set(itermonomials([i, j, k], [2, 2, 2])) == \ + {1, k, i**2*k**2, j*k, j**2, i, i*k, j*k**2, i*j**2*k**2, + i**2*j, i**2*j**2, k**2, j**2*k, i*j**2*k, + j**2*k**2, i*j, i**2*k, i**2*j**2*k, j, i**2*j*k, + i*j**2, i*k**2, i*j*k, i**2*j**2*k**2, i*j*k**2, i**2, i**2*j*k**2 + } + + assert set(itermonomials([x, j, k], [0, 0, 0])) == {S.One} + assert set(itermonomials([x, j, k], [0, 0, 1])) == {1, k} + assert set(itermonomials([x, j, k], [0, 1, 0])) == {1, j} + assert set(itermonomials([x, j, k], [1, 0, 0])) == {x, 1} + assert set(itermonomials([x, j, k], [0, 0, 2])) == {k**2, 1, k} + assert set(itermonomials([x, j, k], [0, 2, 0])) == {1, j, j**2} + assert set(itermonomials([x, j, k], [2, 0, 0])) == {x, 1, x**2} + assert set(itermonomials([x, j, k], [1, 1, 1])) == {1, k, j, j*k, x*k, x, x*j, x*j*k} + assert set(itermonomials([x, j, k], [2, 2, 2])) == \ + {1, k, x**2*k**2, j*k, j**2, x, x*k, j*k**2, x*j**2*k**2, + x**2*j, x**2*j**2, k**2, j**2*k, x*j**2*k, + j**2*k**2, x*j, x**2*k, x**2*j**2*k, j, x**2*j*k, + x*j**2, x*k**2, x*j*k, x**2*j**2*k**2, x*j*k**2, x**2, x**2*j*k**2 + } + +def test_monomial_count(): + assert monomial_count(2, 2) == 6 + assert monomial_count(2, 3) == 10 + +def test_monomial_mul(): + assert monomial_mul((3, 4, 1), (1, 2, 0)) == (4, 6, 1) + +def test_monomial_div(): + assert monomial_div((3, 4, 1), (1, 2, 0)) == (2, 2, 1) + +def test_monomial_gcd(): + assert monomial_gcd((3, 4, 1), (1, 2, 0)) == (1, 2, 0) + +def test_monomial_lcm(): + assert monomial_lcm((3, 4, 1), (1, 2, 0)) == (3, 4, 1) + +def test_monomial_max(): + assert monomial_max((3, 4, 5), (0, 5, 1), (6, 3, 9)) == (6, 5, 9) + +def test_monomial_pow(): + assert monomial_pow((1, 2, 3), 3) == (3, 6, 9) + +def test_monomial_min(): + assert monomial_min((3, 4, 5), (0, 5, 1), (6, 3, 9)) == (0, 3, 1) + +def test_monomial_divides(): + assert monomial_divides((1, 2, 3), (4, 5, 6)) is True + assert monomial_divides((1, 2, 3), (0, 5, 6)) is False + +def test_Monomial(): + m = Monomial((3, 4, 1), (x, y, z)) + n = Monomial((1, 2, 0), (x, y, z)) + + assert m.as_expr() == x**3*y**4*z + assert n.as_expr() == x**1*y**2 + + assert m.as_expr(a, b, c) == a**3*b**4*c + assert n.as_expr(a, b, c) == a**1*b**2 + + assert m.exponents == (3, 4, 1) + assert m.gens == (x, y, z) + + assert n.exponents == (1, 2, 0) + assert n.gens == (x, y, z) + + assert m == (3, 4, 1) + assert n != (3, 4, 1) + assert m != (1, 2, 0) + assert n == (1, 2, 0) + assert (m == 1) is False + + assert m[0] == m[-3] == 3 + assert m[1] == m[-2] == 4 + assert m[2] == m[-1] == 1 + + assert n[0] == n[-3] == 1 + assert n[1] == n[-2] == 2 + assert n[2] == n[-1] == 0 + + assert m[:2] == (3, 4) + assert n[:2] == (1, 2) + + assert m*n == Monomial((4, 6, 1)) + assert m/n == Monomial((2, 2, 1)) + + assert m*(1, 2, 0) == Monomial((4, 6, 1)) + assert m/(1, 2, 0) == Monomial((2, 2, 1)) + + assert m.gcd(n) == Monomial((1, 2, 0)) + assert m.lcm(n) == Monomial((3, 4, 1)) + + assert m.gcd((1, 2, 0)) == Monomial((1, 2, 0)) + assert m.lcm((1, 2, 0)) == Monomial((3, 4, 1)) + + assert m**0 == Monomial((0, 0, 0)) + assert m**1 == m + assert m**2 == Monomial((6, 8, 2)) + assert m**3 == Monomial((9, 12, 3)) + _a = Monomial((0, 0, 0)) + for n in range(10): + assert _a == m**n + _a *= m + + raises(ExactQuotientFailed, lambda: m/Monomial((5, 2, 0))) + + mm = Monomial((1, 2, 3)) + raises(ValueError, lambda: mm.as_expr()) + assert str(mm) == 'Monomial((1, 2, 3))' + assert str(m) == 'x**3*y**4*z**1' + raises(NotImplementedError, lambda: m*1) + raises(NotImplementedError, lambda: m/1) + raises(ValueError, lambda: m**-1) + raises(TypeError, lambda: m.gcd(3)) + raises(TypeError, lambda: m.lcm(3)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_multivariate_resultants.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_multivariate_resultants.py new file mode 100644 index 0000000000000000000000000000000000000000..0799feb41fc875cf038723916a3efd62ff31b1b4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_multivariate_resultants.py @@ -0,0 +1,294 @@ +"""Tests for Dixon's and Macaulay's classes. """ + +from sympy.matrices.dense import Matrix +from sympy.polys.polytools import factor +from sympy.core import symbols +from sympy.tensor.indexed import IndexedBase + +from sympy.polys.multivariate_resultants import (DixonResultant, + MacaulayResultant) + +c, d = symbols("a, b") +x, y = symbols("x, y") + +p = c * x + y +q = x + d * y + +dixon = DixonResultant(polynomials=[p, q], variables=[x, y]) +macaulay = MacaulayResultant(polynomials=[p, q], variables=[x, y]) + +def test_dixon_resultant_init(): + """Test init method of DixonResultant.""" + a = IndexedBase("alpha") + + assert dixon.polynomials == [p, q] + assert dixon.variables == [x, y] + assert dixon.n == 2 + assert dixon.m == 2 + assert dixon.dummy_variables == [a[0], a[1]] + +def test_get_dixon_polynomial_numerical(): + """Test Dixon's polynomial for a numerical example.""" + a = IndexedBase("alpha") + + p = x + y + q = x ** 2 + y **3 + h = x ** 2 + y + + dixon = DixonResultant([p, q, h], [x, y]) + polynomial = -x * y ** 2 * a[0] - x * y ** 2 * a[1] - x * y * a[0] \ + * a[1] - x * y * a[1] ** 2 - x * a[0] * a[1] ** 2 + x * a[0] - \ + y ** 2 * a[0] * a[1] + y ** 2 * a[1] - y * a[0] * a[1] ** 2 + y * \ + a[1] ** 2 + + assert dixon.get_dixon_polynomial().as_expr().expand() == polynomial + +def test_get_max_degrees(): + """Tests max degrees function.""" + + p = x + y + q = x ** 2 + y **3 + h = x ** 2 + y + + dixon = DixonResultant(polynomials=[p, q, h], variables=[x, y]) + dixon_polynomial = dixon.get_dixon_polynomial() + + assert dixon.get_max_degrees(dixon_polynomial) == [1, 2] + +def test_get_dixon_matrix(): + """Test Dixon's resultant for a numerical example.""" + + x, y = symbols('x, y') + + p = x + y + q = x ** 2 + y ** 3 + h = x ** 2 + y + + dixon = DixonResultant([p, q, h], [x, y]) + polynomial = dixon.get_dixon_polynomial() + + assert dixon.get_dixon_matrix(polynomial).det() == 0 + +def test_get_dixon_matrix_example_two(): + """Test Dixon's matrix for example from [Palancz08]_.""" + x, y, z = symbols('x, y, z') + + f = x ** 2 + y ** 2 - 1 + z * 0 + g = x ** 2 + z ** 2 - 1 + y * 0 + h = y ** 2 + z ** 2 - 1 + + example_two = DixonResultant([f, g, h], [y, z]) + poly = example_two.get_dixon_polynomial() + matrix = example_two.get_dixon_matrix(poly) + + expr = 1 - 8 * x ** 2 + 24 * x ** 4 - 32 * x ** 6 + 16 * x ** 8 + assert (matrix.det() - expr).expand() == 0 + +def test_KSY_precondition(): + """Tests precondition for KSY Resultant.""" + A, B, C = symbols('A, B, C') + + m1 = Matrix([[1, 2, 3], + [4, 5, 12], + [6, 7, 18]]) + + m2 = Matrix([[0, C**2], + [-2 * C, -C ** 2]]) + + m3 = Matrix([[1, 0], + [0, 1]]) + + m4 = Matrix([[A**2, 0, 1], + [A, 1, 1 / A]]) + + m5 = Matrix([[5, 1], + [2, B], + [0, 1], + [0, 0]]) + + assert dixon.KSY_precondition(m1) == False + assert dixon.KSY_precondition(m2) == True + assert dixon.KSY_precondition(m3) == True + assert dixon.KSY_precondition(m4) == False + assert dixon.KSY_precondition(m5) == True + +def test_delete_zero_rows_and_columns(): + """Tests method for deleting rows and columns containing only zeros.""" + A, B, C = symbols('A, B, C') + + m1 = Matrix([[0, 0], + [0, 0], + [1, 2]]) + + m2 = Matrix([[0, 1, 2], + [0, 3, 4], + [0, 5, 6]]) + + m3 = Matrix([[0, 0, 0, 0], + [0, 1, 2, 0], + [0, 3, 4, 0], + [0, 0, 0, 0]]) + + m4 = Matrix([[1, 0, 2], + [0, 0, 0], + [3, 0, 4]]) + + m5 = Matrix([[0, 0, 0, 1], + [0, 0, 0, 2], + [0, 0, 0, 3], + [0, 0, 0, 4]]) + + m6 = Matrix([[0, 0, A], + [B, 0, 0], + [0, 0, C]]) + + assert dixon.delete_zero_rows_and_columns(m1) == Matrix([[1, 2]]) + + assert dixon.delete_zero_rows_and_columns(m2) == Matrix([[1, 2], + [3, 4], + [5, 6]]) + + assert dixon.delete_zero_rows_and_columns(m3) == Matrix([[1, 2], + [3, 4]]) + + assert dixon.delete_zero_rows_and_columns(m4) == Matrix([[1, 2], + [3, 4]]) + + assert dixon.delete_zero_rows_and_columns(m5) == Matrix([[1], + [2], + [3], + [4]]) + + assert dixon.delete_zero_rows_and_columns(m6) == Matrix([[0, A], + [B, 0], + [0, C]]) + +def test_product_leading_entries(): + """Tests product of leading entries method.""" + A, B = symbols('A, B') + + m1 = Matrix([[1, 2, 3], + [0, 4, 5], + [0, 0, 6]]) + + m2 = Matrix([[0, 0, 1], + [2, 0, 3]]) + + m3 = Matrix([[0, 0, 0], + [1, 2, 3], + [0, 0, 0]]) + + m4 = Matrix([[0, 0, A], + [1, 2, 3], + [B, 0, 0]]) + + assert dixon.product_leading_entries(m1) == 24 + assert dixon.product_leading_entries(m2) == 2 + assert dixon.product_leading_entries(m3) == 1 + assert dixon.product_leading_entries(m4) == A * B + +def test_get_KSY_Dixon_resultant_example_one(): + """Tests the KSY Dixon resultant for example one""" + x, y, z = symbols('x, y, z') + + p = x * y * z + q = x**2 - z**2 + h = x + y + z + dixon = DixonResultant([p, q, h], [x, y]) + dixon_poly = dixon.get_dixon_polynomial() + dixon_matrix = dixon.get_dixon_matrix(dixon_poly) + D = dixon.get_KSY_Dixon_resultant(dixon_matrix) + + assert D == -z**3 + +def test_get_KSY_Dixon_resultant_example_two(): + """Tests the KSY Dixon resultant for example two""" + x, y, A = symbols('x, y, A') + + p = x * y + x * A + x - A**2 - A + y**2 + y + q = x**2 + x * A - x + x * y + y * A - y + h = x**2 + x * y + 2 * x - x * A - y * A - 2 * A + + dixon = DixonResultant([p, q, h], [x, y]) + dixon_poly = dixon.get_dixon_polynomial() + dixon_matrix = dixon.get_dixon_matrix(dixon_poly) + D = factor(dixon.get_KSY_Dixon_resultant(dixon_matrix)) + + assert D == -8*A*(A - 1)*(A + 2)*(2*A - 1)**2 + +def test_macaulay_resultant_init(): + """Test init method of MacaulayResultant.""" + + assert macaulay.polynomials == [p, q] + assert macaulay.variables == [x, y] + assert macaulay.n == 2 + assert macaulay.degrees == [1, 1] + assert macaulay.degree_m == 1 + assert macaulay.monomials_size == 2 + +def test_get_degree_m(): + assert macaulay._get_degree_m() == 1 + +def test_get_size(): + assert macaulay.get_size() == 2 + +def test_macaulay_example_one(): + """Tests the Macaulay for example from [Bruce97]_""" + + x, y, z = symbols('x, y, z') + a_1_1, a_1_2, a_1_3 = symbols('a_1_1, a_1_2, a_1_3') + a_2_2, a_2_3, a_3_3 = symbols('a_2_2, a_2_3, a_3_3') + b_1_1, b_1_2, b_1_3 = symbols('b_1_1, b_1_2, b_1_3') + b_2_2, b_2_3, b_3_3 = symbols('b_2_2, b_2_3, b_3_3') + c_1, c_2, c_3 = symbols('c_1, c_2, c_3') + + f_1 = a_1_1 * x ** 2 + a_1_2 * x * y + a_1_3 * x * z + \ + a_2_2 * y ** 2 + a_2_3 * y * z + a_3_3 * z ** 2 + f_2 = b_1_1 * x ** 2 + b_1_2 * x * y + b_1_3 * x * z + \ + b_2_2 * y ** 2 + b_2_3 * y * z + b_3_3 * z ** 2 + f_3 = c_1 * x + c_2 * y + c_3 * z + + mac = MacaulayResultant([f_1, f_2, f_3], [x, y, z]) + + assert mac.degrees == [2, 2, 1] + assert mac.degree_m == 3 + + assert mac.monomial_set == [x ** 3, x ** 2 * y, x ** 2 * z, + x * y ** 2, + x * y * z, x * z ** 2, y ** 3, + y ** 2 *z, y * z ** 2, z ** 3] + assert mac.monomials_size == 10 + assert mac.get_row_coefficients() == [[x, y, z], [x, y, z], + [x * y, x * z, y * z, z ** 2]] + + matrix = mac.get_matrix() + assert matrix.shape == (mac.monomials_size, mac.monomials_size) + assert mac.get_submatrix(matrix) == Matrix([[a_1_1, a_2_2], + [b_1_1, b_2_2]]) + +def test_macaulay_example_two(): + """Tests the Macaulay formulation for example from [Stiller96]_.""" + + x, y, z = symbols('x, y, z') + a_0, a_1, a_2 = symbols('a_0, a_1, a_2') + b_0, b_1, b_2 = symbols('b_0, b_1, b_2') + c_0, c_1, c_2, c_3, c_4 = symbols('c_0, c_1, c_2, c_3, c_4') + + f = a_0 * y - a_1 * x + a_2 * z + g = b_1 * x ** 2 + b_0 * y ** 2 - b_2 * z ** 2 + h = c_0 * y - c_1 * x ** 3 + c_2 * x ** 2 * z - c_3 * x * z ** 2 + \ + c_4 * z ** 3 + + mac = MacaulayResultant([f, g, h], [x, y, z]) + + assert mac.degrees == [1, 2, 3] + assert mac.degree_m == 4 + assert mac.monomials_size == 15 + assert len(mac.get_row_coefficients()) == mac.n + + matrix = mac.get_matrix() + assert matrix.shape == (mac.monomials_size, mac.monomials_size) + assert mac.get_submatrix(matrix) == Matrix([[-a_1, a_0, a_2, 0], + [0, -a_1, 0, 0], + [0, 0, -a_1, 0], + [0, 0, 0, -a_1]]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orderings.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orderings.py new file mode 100644 index 0000000000000000000000000000000000000000..d61d4887754c9d9f49905c2e131d253a45cf2ffd --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orderings.py @@ -0,0 +1,124 @@ +"""Tests of monomial orderings. """ + +from sympy.polys.orderings import ( + monomial_key, lex, grlex, grevlex, ilex, igrlex, + LexOrder, InverseOrder, ProductOrder, build_product_order, +) + +from sympy.abc import x, y, z, t +from sympy.core import S +from sympy.testing.pytest import raises + +def test_lex_order(): + assert lex((1, 2, 3)) == (1, 2, 3) + assert str(lex) == 'lex' + + assert lex((1, 2, 3)) == lex((1, 2, 3)) + + assert lex((2, 2, 3)) > lex((1, 2, 3)) + assert lex((1, 3, 3)) > lex((1, 2, 3)) + assert lex((1, 2, 4)) > lex((1, 2, 3)) + + assert lex((0, 2, 3)) < lex((1, 2, 3)) + assert lex((1, 1, 3)) < lex((1, 2, 3)) + assert lex((1, 2, 2)) < lex((1, 2, 3)) + + assert lex.is_global is True + assert lex == LexOrder() + assert lex != grlex + +def test_grlex_order(): + assert grlex((1, 2, 3)) == (6, (1, 2, 3)) + assert str(grlex) == 'grlex' + + assert grlex((1, 2, 3)) == grlex((1, 2, 3)) + + assert grlex((2, 2, 3)) > grlex((1, 2, 3)) + assert grlex((1, 3, 3)) > grlex((1, 2, 3)) + assert grlex((1, 2, 4)) > grlex((1, 2, 3)) + + assert grlex((0, 2, 3)) < grlex((1, 2, 3)) + assert grlex((1, 1, 3)) < grlex((1, 2, 3)) + assert grlex((1, 2, 2)) < grlex((1, 2, 3)) + + assert grlex((2, 2, 3)) > grlex((1, 2, 4)) + assert grlex((1, 3, 3)) > grlex((1, 2, 4)) + + assert grlex((0, 2, 3)) < grlex((1, 2, 2)) + assert grlex((1, 1, 3)) < grlex((1, 2, 2)) + + assert grlex((0, 1, 1)) > grlex((0, 0, 2)) + assert grlex((0, 3, 1)) < grlex((2, 2, 1)) + + assert grlex.is_global is True + +def test_grevlex_order(): + assert grevlex((1, 2, 3)) == (6, (-3, -2, -1)) + assert str(grevlex) == 'grevlex' + + assert grevlex((1, 2, 3)) == grevlex((1, 2, 3)) + + assert grevlex((2, 2, 3)) > grevlex((1, 2, 3)) + assert grevlex((1, 3, 3)) > grevlex((1, 2, 3)) + assert grevlex((1, 2, 4)) > grevlex((1, 2, 3)) + + assert grevlex((0, 2, 3)) < grevlex((1, 2, 3)) + assert grevlex((1, 1, 3)) < grevlex((1, 2, 3)) + assert grevlex((1, 2, 2)) < grevlex((1, 2, 3)) + + assert grevlex((2, 2, 3)) > grevlex((1, 2, 4)) + assert grevlex((1, 3, 3)) > grevlex((1, 2, 4)) + + assert grevlex((0, 2, 3)) < grevlex((1, 2, 2)) + assert grevlex((1, 1, 3)) < grevlex((1, 2, 2)) + + assert grevlex((0, 1, 1)) > grevlex((0, 0, 2)) + assert grevlex((0, 3, 1)) < grevlex((2, 2, 1)) + + assert grevlex.is_global is True + +def test_InverseOrder(): + ilex = InverseOrder(lex) + igrlex = InverseOrder(grlex) + + assert ilex((1, 2, 3)) > ilex((2, 0, 3)) + assert igrlex((1, 2, 3)) < igrlex((0, 2, 3)) + assert str(ilex) == "ilex" + assert str(igrlex) == "igrlex" + assert ilex.is_global is False + assert igrlex.is_global is False + assert ilex != igrlex + assert ilex == InverseOrder(LexOrder()) + +def test_ProductOrder(): + P = ProductOrder((grlex, lambda m: m[:2]), (grlex, lambda m: m[2:])) + assert P((1, 3, 3, 4, 5)) > P((2, 1, 5, 5, 5)) + assert str(P) == "ProductOrder(grlex, grlex)" + assert P.is_global is True + assert ProductOrder((grlex, None), (ilex, None)).is_global is None + assert ProductOrder((igrlex, None), (ilex, None)).is_global is False + +def test_monomial_key(): + assert monomial_key() == lex + + assert monomial_key('lex') == lex + assert monomial_key('grlex') == grlex + assert monomial_key('grevlex') == grevlex + + raises(ValueError, lambda: monomial_key('foo')) + raises(ValueError, lambda: monomial_key(1)) + + M = [x, x**2*z**2, x*y, x**2, S.One, y**2, x**3, y, z, x*y**2*z, x**2*y**2] + assert sorted(M, key=monomial_key('lex', [z, y, x])) == \ + [S.One, x, x**2, x**3, y, x*y, y**2, x**2*y**2, z, x*y**2*z, x**2*z**2] + assert sorted(M, key=monomial_key('grlex', [z, y, x])) == \ + [S.One, x, y, z, x**2, x*y, y**2, x**3, x**2*y**2, x*y**2*z, x**2*z**2] + assert sorted(M, key=monomial_key('grevlex', [z, y, x])) == \ + [S.One, x, y, z, x**2, x*y, y**2, x**3, x**2*y**2, x**2*z**2, x*y**2*z] + +def test_build_product_order(): + assert build_product_order((("grlex", x, y), ("grlex", z, t)), [x, y, z, t])((4, 5, 6, 7)) == \ + ((9, (4, 5)), (13, (6, 7))) + + assert build_product_order((("grlex", x, y), ("grlex", z, t)), [x, y, z, t]) == \ + build_product_order((("grlex", x, y), ("grlex", z, t)), [x, y, z, t]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orthopolys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orthopolys.py new file mode 100644 index 0000000000000000000000000000000000000000..e81fbe75aa6285d229ba817026f44b23b76abd6a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_orthopolys.py @@ -0,0 +1,175 @@ +"""Tests for efficient functions for generating orthogonal polynomials. """ + +from sympy.core.numbers import Rational as Q +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.polys.polytools import Poly +from sympy.testing.pytest import raises + +from sympy.polys.orthopolys import ( + jacobi_poly, + gegenbauer_poly, + chebyshevt_poly, + chebyshevu_poly, + hermite_poly, + hermite_prob_poly, + legendre_poly, + laguerre_poly, + spherical_bessel_fn, +) + +from sympy.abc import x, a, b + + +def test_jacobi_poly(): + raises(ValueError, lambda: jacobi_poly(-1, a, b, x)) + + assert jacobi_poly(1, a, b, x, polys=True) == Poly( + (a/2 + b/2 + 1)*x + a/2 - b/2, x, domain='ZZ(a,b)') + + assert jacobi_poly(0, a, b, x) == 1 + assert jacobi_poly(1, a, b, x) == a/2 - b/2 + x*(a/2 + b/2 + 1) + assert jacobi_poly(2, a, b, x) == (a**2/8 - a*b/4 - a/8 + b**2/8 - b/8 + + x**2*(a**2/8 + a*b/4 + a*Q(7, 8) + b**2/8 + + b*Q(7, 8) + Q(3, 2)) + x*(a**2/4 + + a*Q(3, 4) - b**2/4 - b*Q(3, 4)) - S.Half) + + assert jacobi_poly(1, a, b, polys=True) == Poly( + (a/2 + b/2 + 1)*x + a/2 - b/2, x, domain='ZZ(a,b)') + + +def test_gegenbauer_poly(): + raises(ValueError, lambda: gegenbauer_poly(-1, a, x)) + + assert gegenbauer_poly( + 1, a, x, polys=True) == Poly(2*a*x, x, domain='ZZ(a)') + + assert gegenbauer_poly(0, a, x) == 1 + assert gegenbauer_poly(1, a, x) == 2*a*x + assert gegenbauer_poly(2, a, x) == -a + x**2*(2*a**2 + 2*a) + assert gegenbauer_poly( + 3, a, x) == x**3*(4*a**3/3 + 4*a**2 + a*Q(8, 3)) + x*(-2*a**2 - 2*a) + + assert gegenbauer_poly(1, S.Half).dummy_eq(x) + assert gegenbauer_poly(1, a, polys=True) == Poly(2*a*x, x, domain='ZZ(a)') + + +def test_chebyshevt_poly(): + raises(ValueError, lambda: chebyshevt_poly(-1, x)) + + assert chebyshevt_poly(1, x, polys=True) == Poly(x) + + assert chebyshevt_poly(0, x) == 1 + assert chebyshevt_poly(1, x) == x + assert chebyshevt_poly(2, x) == 2*x**2 - 1 + assert chebyshevt_poly(3, x) == 4*x**3 - 3*x + assert chebyshevt_poly(4, x) == 8*x**4 - 8*x**2 + 1 + assert chebyshevt_poly(5, x) == 16*x**5 - 20*x**3 + 5*x + assert chebyshevt_poly(6, x) == 32*x**6 - 48*x**4 + 18*x**2 - 1 + assert chebyshevt_poly(75, x) == (2*chebyshevt_poly(37, x)*chebyshevt_poly(38, x) - x).expand() + assert chebyshevt_poly(100, x) == (2*chebyshevt_poly(50, x)**2 - 1).expand() + + assert chebyshevt_poly(1).dummy_eq(x) + assert chebyshevt_poly(1, polys=True) == Poly(x) + + +def test_chebyshevu_poly(): + raises(ValueError, lambda: chebyshevu_poly(-1, x)) + + assert chebyshevu_poly(1, x, polys=True) == Poly(2*x) + + assert chebyshevu_poly(0, x) == 1 + assert chebyshevu_poly(1, x) == 2*x + assert chebyshevu_poly(2, x) == 4*x**2 - 1 + assert chebyshevu_poly(3, x) == 8*x**3 - 4*x + assert chebyshevu_poly(4, x) == 16*x**4 - 12*x**2 + 1 + assert chebyshevu_poly(5, x) == 32*x**5 - 32*x**3 + 6*x + assert chebyshevu_poly(6, x) == 64*x**6 - 80*x**4 + 24*x**2 - 1 + + assert chebyshevu_poly(1).dummy_eq(2*x) + assert chebyshevu_poly(1, polys=True) == Poly(2*x) + + +def test_hermite_poly(): + raises(ValueError, lambda: hermite_poly(-1, x)) + + assert hermite_poly(1, x, polys=True) == Poly(2*x) + + assert hermite_poly(0, x) == 1 + assert hermite_poly(1, x) == 2*x + assert hermite_poly(2, x) == 4*x**2 - 2 + assert hermite_poly(3, x) == 8*x**3 - 12*x + assert hermite_poly(4, x) == 16*x**4 - 48*x**2 + 12 + assert hermite_poly(5, x) == 32*x**5 - 160*x**3 + 120*x + assert hermite_poly(6, x) == 64*x**6 - 480*x**4 + 720*x**2 - 120 + + assert hermite_poly(1).dummy_eq(2*x) + assert hermite_poly(1, polys=True) == Poly(2*x) + + +def test_hermite_prob_poly(): + raises(ValueError, lambda: hermite_prob_poly(-1, x)) + + assert hermite_prob_poly(1, x, polys=True) == Poly(x) + + assert hermite_prob_poly(0, x) == 1 + assert hermite_prob_poly(1, x) == x + assert hermite_prob_poly(2, x) == x**2 - 1 + assert hermite_prob_poly(3, x) == x**3 - 3*x + assert hermite_prob_poly(4, x) == x**4 - 6*x**2 + 3 + assert hermite_prob_poly(5, x) == x**5 - 10*x**3 + 15*x + assert hermite_prob_poly(6, x) == x**6 - 15*x**4 + 45*x**2 - 15 + + assert hermite_prob_poly(1).dummy_eq(x) + assert hermite_prob_poly(1, polys=True) == Poly(x) + + +def test_legendre_poly(): + raises(ValueError, lambda: legendre_poly(-1, x)) + + assert legendre_poly(1, x, polys=True) == Poly(x, domain='QQ') + + assert legendre_poly(0, x) == 1 + assert legendre_poly(1, x) == x + assert legendre_poly(2, x) == Q(3, 2)*x**2 - Q(1, 2) + assert legendre_poly(3, x) == Q(5, 2)*x**3 - Q(3, 2)*x + assert legendre_poly(4, x) == Q(35, 8)*x**4 - Q(30, 8)*x**2 + Q(3, 8) + assert legendre_poly(5, x) == Q(63, 8)*x**5 - Q(70, 8)*x**3 + Q(15, 8)*x + assert legendre_poly(6, x) == Q( + 231, 16)*x**6 - Q(315, 16)*x**4 + Q(105, 16)*x**2 - Q(5, 16) + + assert legendre_poly(1).dummy_eq(x) + assert legendre_poly(1, polys=True) == Poly(x) + + +def test_laguerre_poly(): + raises(ValueError, lambda: laguerre_poly(-1, x)) + + assert laguerre_poly(1, x, polys=True) == Poly(-x + 1, domain='QQ') + + assert laguerre_poly(0, x) == 1 + assert laguerre_poly(1, x) == -x + 1 + assert laguerre_poly(2, x) == Q(1, 2)*x**2 - Q(4, 2)*x + 1 + assert laguerre_poly(3, x) == -Q(1, 6)*x**3 + Q(9, 6)*x**2 - Q(18, 6)*x + 1 + assert laguerre_poly(4, x) == Q( + 1, 24)*x**4 - Q(16, 24)*x**3 + Q(72, 24)*x**2 - Q(96, 24)*x + 1 + assert laguerre_poly(5, x) == -Q(1, 120)*x**5 + Q(25, 120)*x**4 - Q( + 200, 120)*x**3 + Q(600, 120)*x**2 - Q(600, 120)*x + 1 + assert laguerre_poly(6, x) == Q(1, 720)*x**6 - Q(36, 720)*x**5 + Q(450, 720)*x**4 - Q(2400, 720)*x**3 + Q(5400, 720)*x**2 - Q(4320, 720)*x + 1 + + assert laguerre_poly(0, x, a) == 1 + assert laguerre_poly(1, x, a) == -x + a + 1 + assert laguerre_poly(2, x, a) == x**2/2 + (-a - 2)*x + a**2/2 + a*Q(3, 2) + 1 + assert laguerre_poly(3, x, a) == -x**3/6 + (a/2 + Q( + 3)/2)*x**2 + (-a**2/2 - a*Q(5, 2) - 3)*x + a**3/6 + a**2 + a*Q(11, 6) + 1 + + assert laguerre_poly(1).dummy_eq(-x + 1) + assert laguerre_poly(1, polys=True) == Poly(-x + 1) + + +def test_spherical_bessel_fn(): + x, z = symbols("x z") + assert spherical_bessel_fn(1, z) == 1/z**2 + assert spherical_bessel_fn(2, z) == -1/z + 3/z**3 + assert spherical_bessel_fn(3, z) == -6/z**2 + 15/z**4 + assert spherical_bessel_fn(4, z) == 1/z - 45/z**3 + 105/z**5 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_partfrac.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_partfrac.py new file mode 100644 index 0000000000000000000000000000000000000000..83c5d48383d20e67dbb53c081093ad35e654c9a0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_partfrac.py @@ -0,0 +1,249 @@ +"""Tests for algorithms for partial fraction decomposition of rational +functions. """ + +from sympy.polys.partfrac import ( + apart_undetermined_coeffs, + apart, + apart_list, assemble_partfrac_list +) + +from sympy.core.expr import Expr +from sympy.core.function import Lambda +from sympy.core.numbers import (E, I, Rational, pi, all_close) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.matrices.dense import Matrix +from sympy.polys.polytools import (Poly, factor) +from sympy.polys.rationaltools import together +from sympy.polys.rootoftools import RootSum +from sympy.testing.pytest import raises, XFAIL +from sympy.abc import x, y, a, b, c + + +def test_apart(): + assert apart(1) == 1 + assert apart(1, x) == 1 + + f, g = (x**2 + 1)/(x + 1), 2/(x + 1) + x - 1 + + assert apart(f, full=False) == g + assert apart(f, full=True) == g + + f, g = 1/(x + 2)/(x + 1), 1/(1 + x) - 1/(2 + x) + + assert apart(f, full=False) == g + assert apart(f, full=True) == g + + f, g = 1/(x + 1)/(x + 5), -1/(5 + x)/4 + 1/(1 + x)/4 + + assert apart(f, full=False) == g + assert apart(f, full=True) == g + + assert apart((E*x + 2)/(x - pi)*(x - 1), x) == \ + 2 - E + E*pi + E*x + (E*pi + 2)*(pi - 1)/(x - pi) + + assert apart(Eq((x**2 + 1)/(x + 1), x), x) == Eq(x - 1 + 2/(x + 1), x) + + assert apart(x/2, y) == x/2 + + f, g = (x+y)/(2*x - y), Rational(3, 2)*y/(2*x - y) + S.Half + + assert apart(f, x, full=False) == g + assert apart(f, x, full=True) == g + + f, g = (x+y)/(2*x - y), 3*x/(2*x - y) - 1 + + assert apart(f, y, full=False) == g + assert apart(f, y, full=True) == g + + raises(NotImplementedError, lambda: apart(1/(x + 1)/(y + 2))) + + +def test_apart_matrix(): + M = Matrix(2, 2, lambda i, j: 1/(x + i + 1)/(x + j)) + + assert apart(M) == Matrix([ + [1/x - 1/(x + 1), (x + 1)**(-2)], + [1/(2*x) - (S.Half)/(x + 2), 1/(x + 1) - 1/(x + 2)], + ]) + + +def test_apart_symbolic(): + f = a*x**4 + (2*b + 2*a*c)*x**3 + (4*b*c - a**2 + a*c**2)*x**2 + \ + (-2*a*b + 2*b*c**2)*x - b**2 + g = a**2*x**4 + (2*a*b + 2*c*a**2)*x**3 + (4*a*b*c + b**2 + + a**2*c**2)*x**2 + (2*c*b**2 + 2*a*b*c**2)*x + b**2*c**2 + + assert apart(f/g, x) == 1/a - 1/(x + c)**2 - b**2/(a*(a*x + b)**2) + + assert apart(1/((x + a)*(x + b)*(x + c)), x) == \ + 1/((a - c)*(b - c)*(c + x)) - 1/((a - b)*(b - c)*(b + x)) + \ + 1/((a - b)*(a - c)*(a + x)) + + +def _make_extension_example(): + # https://github.com/sympy/sympy/issues/18531 + from sympy.core import Mul + def mul2(expr): + # 2-arg mul hack... + return Mul(2, expr, evaluate=False) + + f = ((x**2 + 1)**3/((x - 1)**2*(x + 1)**2*(-x**2 + 2*x + 1)*(x**2 + 2*x - 1))) + g = (1/mul2(x - sqrt(2) + 1) + - 1/mul2(x - sqrt(2) - 1) + + 1/mul2(x + 1 + sqrt(2)) + - 1/mul2(x - 1 + sqrt(2)) + + 1/mul2((x + 1)**2) + + 1/mul2((x - 1)**2)) + return f, g + + +def test_apart_extension(): + f = 2/(x**2 + 1) + g = I/(x + I) - I/(x - I) + + assert apart(f, extension=I) == g + assert apart(f, gaussian=True) == g + + f = x/((x - 2)*(x + I)) + + assert factor(together(apart(f)).expand()) == f + + f, g = _make_extension_example() + + # XXX: Only works with dotprodsimp. See test_apart_extension_xfail below + from sympy.matrices import dotprodsimp + with dotprodsimp(True): + assert apart(f, x, extension={sqrt(2)}) == g + + +def test_apart_extension_xfail(): + f, g = _make_extension_example() + assert apart(f, x, extension={sqrt(2)}) == g + + +def test_apart_full(): + f = 1/(x**2 + 1) + + assert apart(f, full=False) == f + assert apart(f, full=True).dummy_eq( + -RootSum(x**2 + 1, Lambda(a, a/(x - a)), auto=False)/2) + + f = 1/(x**3 + x + 1) + + assert apart(f, full=False) == f + assert apart(f, full=True).dummy_eq( + RootSum(x**3 + x + 1, + Lambda(a, (a**2*Rational(6, 31) - a*Rational(9, 31) + Rational(4, 31))/(x - a)), auto=False)) + + f = 1/(x**5 + 1) + + assert apart(f, full=False) == \ + (Rational(-1, 5))*((x**3 - 2*x**2 + 3*x - 4)/(x**4 - x**3 + x**2 - + x + 1)) + (Rational(1, 5))/(x + 1) + assert apart(f, full=True).dummy_eq( + -RootSum(x**4 - x**3 + x**2 - x + 1, + Lambda(a, a/(x - a)), auto=False)/5 + (Rational(1, 5))/(x + 1)) + + +def test_apart_full_floats(): + # https://github.com/sympy/sympy/issues/26648 + f = ( + 6.43369157032015e-9*x**3 + 1.35203404799555e-5*x**2 + + 0.00357538393743079*x + 0.085 + )/( + 4.74334912634438e-11*x**4 + 4.09576274286244e-6*x**3 + + 0.00334241812250921*x**2 + 0.15406018058983*x + 1.0 + ) + + expected = ( + 133.599202650992/(x + 85524.0054884464) + + 1.07757928431867/(x + 774.88576677949) + + 0.395006955518971/(x + 40.7977016133126) + + 0.564264854137341/(x + 7.79746609204661) + ) + + f_apart = apart(f, full=True).evalf() + + # There is a significant floating point error in this operation. + assert all_close(f_apart, expected, rtol=1e-3, atol=1e-5) + + +def test_apart_undetermined_coeffs(): + p = Poly(2*x - 3) + q = Poly(x**9 - x**8 - x**6 + x**5 - 2*x**2 + 3*x - 1) + r = (-x**7 - x**6 - x**5 + 4)/(x**8 - x**5 - 2*x + 1) + 1/(x - 1) + + assert apart_undetermined_coeffs(p, q) == r + + p = Poly(1, x, domain='ZZ[a,b]') + q = Poly((x + a)*(x + b), x, domain='ZZ[a,b]') + r = 1/((a - b)*(b + x)) - 1/((a - b)*(a + x)) + + assert apart_undetermined_coeffs(p, q) == r + + +def test_apart_list(): + from sympy.utilities.iterables import numbered_symbols + def dummy_eq(i, j): + if type(i) in (list, tuple): + return all(dummy_eq(i, j) for i, j in zip(i, j)) + return i == j or i.dummy_eq(j) + + w0, w1, w2 = Symbol("w0"), Symbol("w1"), Symbol("w2") + _a = Dummy("a") + + f = (-2*x - 2*x**2) / (3*x**2 - 6*x) + got = apart_list(f, x, dummies=numbered_symbols("w")) + ans = (-1, Poly(Rational(2, 3), x, domain='QQ'), + [(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 2), Lambda(_a, -_a + x), 1)]) + assert dummy_eq(got, ans) + + got = apart_list(2/(x**2-2), x, dummies=numbered_symbols("w")) + ans = (1, Poly(0, x, domain='ZZ'), [(Poly(w0**2 - 2, w0, domain='ZZ'), + Lambda(_a, _a/2), + Lambda(_a, -_a + x), 1)]) + assert dummy_eq(got, ans) + + f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) + got = apart_list(f, x, dummies=numbered_symbols("w")) + ans = (1, Poly(0, x, domain='ZZ'), + [(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1), + (Poly(w1**2 - 1, w1, domain='ZZ'), Lambda(_a, -3*_a - 6), Lambda(_a, -_a + x), 2), + (Poly(w2 + 1, w2, domain='ZZ'), Lambda(_a, -4), Lambda(_a, -_a + x), 1)]) + assert dummy_eq(got, ans) + + +def test_assemble_partfrac_list(): + f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) + pfd = apart_list(f) + assert assemble_partfrac_list(pfd) == -4/(x + 1) - 3/(x + 1)**2 - 9/(x - 1)**2 + 4/(x - 2) + + a = Dummy("a") + pfd = (1, Poly(0, x, domain='ZZ'), [([sqrt(2),-sqrt(2)], Lambda(a, a/2), Lambda(a, -a + x), 1)]) + assert assemble_partfrac_list(pfd) == -1/(sqrt(2)*(x + sqrt(2))) + 1/(sqrt(2)*(x - sqrt(2))) + + +@XFAIL +def test_noncommutative_pseudomultivariate(): + # apart doesn't go inside noncommutative expressions + class foo(Expr): + is_commutative=False + e = x/(x + x*y) + c = 1/(1 + y) + assert apart(e + foo(e)) == c + foo(c) + assert apart(e*foo(e)) == c*foo(c) + +def test_noncommutative(): + class foo(Expr): + is_commutative=False + e = x/(x + x*y) + c = 1/(1 + y) + assert apart(e + foo()) == c + foo() + +def test_issue_5798(): + assert apart( + 2*x/(x**2 + 1) - (x - 1)/(2*(x**2 + 1)) + 1/(2*(x + 1)) - 2/x) == \ + (3*x + 1)/(x**2 + 1)/2 + 1/(x + 1)/2 - 2/x diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyclasses.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyclasses.py new file mode 100644 index 0000000000000000000000000000000000000000..5e2c8f2c3ca94c42fc524c3ec1c0300d881cf3a5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyclasses.py @@ -0,0 +1,601 @@ +"""Tests for OO layer of several polynomial representations. """ + +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys.domains import ZZ, QQ +from sympy.polys.polyclasses import DMP, DMF, ANP +from sympy.polys.polyerrors import (CoercionFailed, ExactQuotientFailed, + NotInvertible) +from sympy.polys.specialpolys import f_polys +from sympy.testing.pytest import raises, warns_deprecated_sympy + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = [ f.to_dense() for f in f_polys() ] + +def test_DMP___init__(): + f = DMP([[ZZ(0)], [], [ZZ(0), ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) + + assert f._rep == [[1, 2], [3]] + assert f.dom == ZZ + assert f.lev == 1 + + f = DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ, 1) + + assert f._rep == [[1, 2], [3]] + assert f.dom == ZZ + assert f.lev == 1 + + f = DMP.from_dict({(1, 1): ZZ(1), (0, 0): ZZ(2)}, 1, ZZ) + + assert f._rep == [[1, 0], [2]] + assert f.dom == ZZ + assert f.lev == 1 + + +def test_DMP_rep_deprecation(): + f = DMP([1, 2, 3], ZZ) + + with warns_deprecated_sympy(): + assert f.rep == [1, 2, 3] + + +def test_DMP___eq__(): + assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) == \ + DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) + + assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) == \ + DMP([[QQ(1), QQ(2)], [QQ(3)]], QQ) + assert DMP([[QQ(1), QQ(2)], [QQ(3)]], QQ) == \ + DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) + + assert DMP([[[ZZ(1)]]], ZZ) != DMP([[ZZ(1)]], ZZ) + assert DMP([[ZZ(1)]], ZZ) != DMP([[[ZZ(1)]]], ZZ) + + +def test_DMP___bool__(): + assert bool(DMP([[]], ZZ)) is False + assert bool(DMP([[ZZ(1)]], ZZ)) is True + + +def test_DMP_to_dict(): + f = DMP([[ZZ(3)], [], [ZZ(2)], [], [ZZ(8)]], ZZ) + + assert f.to_dict() == \ + {(4, 0): 3, (2, 0): 2, (0, 0): 8} + assert f.to_sympy_dict() == \ + {(4, 0): ZZ.to_sympy(3), (2, 0): ZZ.to_sympy(2), (0, 0): + ZZ.to_sympy(8)} + + +def test_DMP_properties(): + assert DMP([[]], ZZ).is_zero is True + assert DMP([[ZZ(1)]], ZZ).is_zero is False + + assert DMP([[ZZ(1)]], ZZ).is_one is True + assert DMP([[ZZ(2)]], ZZ).is_one is False + + assert DMP([[ZZ(1)]], ZZ).is_ground is True + assert DMP([[ZZ(1)], [ZZ(2)], [ZZ(1)]], ZZ).is_ground is False + + assert DMP([[ZZ(1)], [ZZ(2), ZZ(0)], [ZZ(1), ZZ(0)]], ZZ).is_sqf is True + assert DMP([[ZZ(1)], [ZZ(2), ZZ(0)], [ZZ(1), ZZ(0), ZZ(0)]], ZZ).is_sqf is False + + assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ).is_monic is True + assert DMP([[ZZ(2), ZZ(2)], [ZZ(3)]], ZZ).is_monic is False + + assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ).is_primitive is True + assert DMP([[ZZ(2), ZZ(4)], [ZZ(6)]], ZZ).is_primitive is False + + +def test_DMP_arithmetics(): + f = DMP([[ZZ(2)], [ZZ(2), ZZ(0)]], ZZ) + + assert f.mul_ground(2) == DMP([[ZZ(4)], [ZZ(4), ZZ(0)]], ZZ) + assert f.quo_ground(2) == DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + + raises(ExactQuotientFailed, lambda: f.exquo_ground(3)) + + f = DMP([[ZZ(-5)]], ZZ) + g = DMP([[ZZ(5)]], ZZ) + + assert f.abs() == g + assert abs(f) == g + + assert g.neg() == f + assert -g == f + + h = DMP([[]], ZZ) + + assert f.add(g) == h + assert f + g == h + assert g + f == h + assert f + 5 == h + assert 5 + f == h + + h = DMP([[ZZ(-10)]], ZZ) + + assert f.sub(g) == h + assert f - g == h + assert g - f == -h + assert f - 5 == h + assert 5 - f == -h + + h = DMP([[ZZ(-25)]], ZZ) + + assert f.mul(g) == h + assert f * g == h + assert g * f == h + assert f * 5 == h + assert 5 * f == h + + h = DMP([[ZZ(25)]], ZZ) + + assert f.sqr() == h + assert f.pow(2) == h + assert f**2 == h + + raises(TypeError, lambda: f.pow('x')) + + f = DMP([[ZZ(1)], [], [ZZ(1), ZZ(0), ZZ(0)]], ZZ) + g = DMP([[ZZ(2)], [ZZ(-2), ZZ(0)]], ZZ) + + q = DMP([[ZZ(2)], [ZZ(2), ZZ(0)]], ZZ) + r = DMP([[ZZ(8), ZZ(0), ZZ(0)]], ZZ) + + assert f.pdiv(g) == (q, r) + assert f.pquo(g) == q + assert f.prem(g) == r + + raises(ExactQuotientFailed, lambda: f.pexquo(g)) + + f = DMP([[ZZ(1)], [], [ZZ(1), ZZ(0), ZZ(0)]], ZZ) + g = DMP([[ZZ(1)], [ZZ(-1), ZZ(0)]], ZZ) + + q = DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + r = DMP([[ZZ(2), ZZ(0), ZZ(0)]], ZZ) + + assert f.div(g) == (q, r) + assert f.quo(g) == q + assert f.rem(g) == r + + assert divmod(f, g) == (q, r) + assert f // g == q + assert f % g == r + + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f = DMP([ZZ(1), ZZ(0), ZZ(-1)], ZZ) + g = DMP([ZZ(2), ZZ(-2)], ZZ) + + q = DMP([], ZZ) + r = f + + pq = DMP([ZZ(2), ZZ(2)], ZZ) + pr = DMP([], ZZ) + + assert f.div(g) == (q, r) + assert f.quo(g) == q + assert f.rem(g) == r + + assert divmod(f, g) == (q, r) + assert f // g == q + assert f % g == r + + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + assert f.pdiv(g) == (pq, pr) + assert f.pquo(g) == pq + assert f.prem(g) == pr + assert f.pexquo(g) == pq + + +def test_DMP_functionality(): + f = DMP([[ZZ(1)], [ZZ(2), ZZ(0)], [ZZ(1), ZZ(0), ZZ(0)]], ZZ) + g = DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + h = DMP([[ZZ(1)]], ZZ) + + assert f.degree() == 2 + assert f.degree_list() == (2, 2) + assert f.total_degree() == 2 + + assert f.LC() == ZZ(1) + assert f.TC() == ZZ(0) + assert f.nth(1, 1) == ZZ(2) + + raises(TypeError, lambda: f.nth(0, 'x')) + + assert f.max_norm() == 2 + assert f.l1_norm() == 4 + + u = DMP([[ZZ(2)], [ZZ(2), ZZ(0)]], ZZ) + + assert f.diff(m=1, j=0) == u + assert f.diff(m=1, j=1) == u + + raises(TypeError, lambda: f.diff(m='x', j=0)) + + u = DMP([ZZ(1), ZZ(2), ZZ(1)], ZZ) + v = DMP([ZZ(1), ZZ(2), ZZ(1)], ZZ) + + assert f.eval(a=1, j=0) == u + assert f.eval(a=1, j=1) == v + + assert f.eval(1).eval(1) == ZZ(4) + + assert f.cofactors(g) == (g, g, h) + assert f.gcd(g) == g + assert f.lcm(g) == f + + u = DMP([[QQ(45), QQ(30), QQ(5)]], QQ) + v = DMP([[QQ(1), QQ(2, 3), QQ(1, 9)]], QQ) + + assert u.monic() == v + + assert (4*f).content() == ZZ(4) + assert (4*f).primitive() == (ZZ(4), f) + + f = DMP([QQ(1,3), QQ(1)], QQ) + g = DMP([QQ(1,7), QQ(1)], QQ) + + assert f.cancel(g) == f.cancel(g, include=True) == ( + DMP([QQ(7), QQ(21)], QQ), + DMP([QQ(3), QQ(21)], QQ) + ) + assert f.cancel(g, include=False) == ( + QQ(7), + QQ(3), + DMP([QQ(1), QQ(3)], QQ), + DMP([QQ(1), QQ(7)], QQ) + ) + + f = DMP([[ZZ(1)], [ZZ(2)], [ZZ(3)], [ZZ(4)], [ZZ(5)], [ZZ(6)]], ZZ) + + assert f.trunc(3) == DMP([[ZZ(1)], [ZZ(-1)], [], [ZZ(1)], [ZZ(-1)], []], ZZ) + + f = DMP(f_4, ZZ) + + assert f.sqf_part() == -f + assert f.sqf_list() == (ZZ(-1), [(-f, 1)]) + + f = DMP([[ZZ(-1)], [], [], [ZZ(5)]], ZZ) + g = DMP([[ZZ(3), ZZ(1)], [], []], ZZ) + h = DMP([[ZZ(45), ZZ(30), ZZ(5)]], ZZ) + + r = DMP([ZZ(675), ZZ(675), ZZ(225), ZZ(25)], ZZ) + + assert f.subresultants(g) == [f, g, h] + assert f.resultant(g) == r + + f = DMP([ZZ(1), ZZ(3), ZZ(9), ZZ(-13)], ZZ) + + assert f.discriminant() == -11664 + + f = DMP([QQ(2), QQ(0)], QQ) + g = DMP([QQ(1), QQ(0), QQ(-16)], QQ) + + s = DMP([QQ(1, 32), QQ(0)], QQ) + t = DMP([QQ(-1, 16)], QQ) + h = DMP([QQ(1)], QQ) + + assert f.half_gcdex(g) == (s, h) + assert f.gcdex(g) == (s, t, h) + + assert f.invert(g) == s + + f = DMP([[QQ(1)], [QQ(2)], [QQ(3)]], QQ) + + raises(ValueError, lambda: f.half_gcdex(f)) + raises(ValueError, lambda: f.gcdex(f)) + + raises(ValueError, lambda: f.invert(f)) + + f = DMP(ZZ.map([1, 0, 20, 0, 150, 0, 500, 0, 625, -2, 0, -10, 9]), ZZ) + g = DMP([ZZ(1), ZZ(0), ZZ(0), ZZ(-2), ZZ(9)], ZZ) + h = DMP([ZZ(1), ZZ(0), ZZ(5), ZZ(0)], ZZ) + + assert g.compose(h) == f + assert f.decompose() == [g, h] + + f = DMP([[QQ(1)], [QQ(2)], [QQ(3)]], QQ) + + raises(ValueError, lambda: f.decompose()) + raises(ValueError, lambda: f.sturm()) + + +def test_DMP_exclude(): + f = [[[[[[[[[[[[[[[[[[[[[[[[[[ZZ(1)]], [[]]]]]]]]]]]]]]]]]]]]]]]]]] + J = [0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, + 18, 19, 20, 21, 22, 24, 25] + + assert DMP(f, ZZ).exclude() == (J, DMP([ZZ(1), ZZ(0)], ZZ)) + assert DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ).exclude() ==\ + ([], DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ)) + + +def test_DMF__init__(): + f = DMF(([[0], [], [0, 1, 2], [3]], [[1, 2, 3]]), ZZ) + + assert f.num == [[1, 2], [3]] + assert f.den == [[1, 2, 3]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[1, 2], [3]], [[1, 2, 3]]), ZZ, 1) + + assert f.num == [[1, 2], [3]] + assert f.den == [[1, 2, 3]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[-1], [-2]], [[3], [-4]]), ZZ) + + assert f.num == [[-1], [-2]] + assert f.den == [[3], [-4]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[1], [2]], [[-3], [4]]), ZZ) + + assert f.num == [[-1], [-2]] + assert f.den == [[3], [-4]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[1], [2]], [[-3], [4]]), ZZ) + + assert f.num == [[-1], [-2]] + assert f.den == [[3], [-4]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[]], [[-3], [4]]), ZZ) + + assert f.num == [[]] + assert f.den == [[1]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(17, ZZ, 1) + + assert f.num == [[17]] + assert f.den == [[1]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[1], [2]]), ZZ) + + assert f.num == [[1], [2]] + assert f.den == [[1]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF([[0], [], [0, 1, 2], [3]], ZZ) + + assert f.num == [[1, 2], [3]] + assert f.den == [[1]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF({(1, 1): 1, (0, 0): 2}, ZZ, 1) + + assert f.num == [[1, 0], [2]] + assert f.den == [[1]] + assert f.lev == 1 + assert f.dom == ZZ + + f = DMF(([[QQ(1)], [QQ(2)]], [[-QQ(3)], [QQ(4)]]), QQ) + + assert f.num == [[-QQ(1)], [-QQ(2)]] + assert f.den == [[QQ(3)], [-QQ(4)]] + assert f.lev == 1 + assert f.dom == QQ + + f = DMF(([[QQ(1, 5)], [QQ(2, 5)]], [[-QQ(3, 7)], [QQ(4, 7)]]), QQ) + + assert f.num == [[-QQ(7)], [-QQ(14)]] + assert f.den == [[QQ(15)], [-QQ(20)]] + assert f.lev == 1 + assert f.dom == QQ + + raises(ValueError, lambda: DMF(([1], [[1]]), ZZ)) + raises(ZeroDivisionError, lambda: DMF(([1], []), ZZ)) + + +def test_DMF__bool__(): + assert bool(DMF([[]], ZZ)) is False + assert bool(DMF([[1]], ZZ)) is True + + +def test_DMF_properties(): + assert DMF([[]], ZZ).is_zero is True + assert DMF([[]], ZZ).is_one is False + + assert DMF([[1]], ZZ).is_zero is False + assert DMF([[1]], ZZ).is_one is True + + assert DMF(([[1]], [[2]]), ZZ).is_one is False + + +def test_DMF_arithmetics(): + f = DMF([[7], [-9]], ZZ) + g = DMF([[-7], [9]], ZZ) + + assert f.neg() == -f == g + + f = DMF(([[1]], [[1], []]), ZZ) + g = DMF(([[1]], [[1, 0]]), ZZ) + + h = DMF(([[1], [1, 0]], [[1, 0], []]), ZZ) + + assert f.add(g) == f + g == h + assert g.add(f) == g + f == h + + h = DMF(([[-1], [1, 0]], [[1, 0], []]), ZZ) + + assert f.sub(g) == f - g == h + + h = DMF(([[1]], [[1, 0], []]), ZZ) + + assert f.mul(g) == f*g == h + assert g.mul(f) == g*f == h + + h = DMF(([[1, 0]], [[1], []]), ZZ) + + assert f.quo(g) == f/g == h + + h = DMF(([[1]], [[1], [], [], []]), ZZ) + + assert f.pow(3) == f**3 == h + + h = DMF(([[1]], [[1, 0, 0, 0]]), ZZ) + + assert g.pow(3) == g**3 == h + + h = DMF(([[1, 0]], [[1]]), ZZ) + + assert g.pow(-1) == g**-1 == h + + +def test_ANP___init__(): + rep = [QQ(1), QQ(1)] + mod = [QQ(1), QQ(0), QQ(1)] + + f = ANP(rep, mod, QQ) + + assert f.to_list() == [QQ(1), QQ(1)] + assert f.mod_to_list() == [QQ(1), QQ(0), QQ(1)] + assert f.dom == QQ + + rep = {1: QQ(1), 0: QQ(1)} + mod = {2: QQ(1), 0: QQ(1)} + + f = ANP(rep, mod, QQ) + + assert f.to_list() == [QQ(1), QQ(1)] + assert f.mod_to_list() == [QQ(1), QQ(0), QQ(1)] + assert f.dom == QQ + + f = ANP(1, mod, QQ) + + assert f.to_list() == [QQ(1)] + assert f.mod_to_list() == [QQ(1), QQ(0), QQ(1)] + assert f.dom == QQ + + f = ANP([1, 0.5], mod, QQ) + + assert all(QQ.of_type(a) for a in f.to_list()) + + raises(CoercionFailed, lambda: ANP([sqrt(2)], mod, QQ)) + + +def test_ANP___eq__(): + a = ANP([QQ(1), QQ(1)], [QQ(1), QQ(0), QQ(1)], QQ) + b = ANP([QQ(1), QQ(1)], [QQ(1), QQ(0), QQ(2)], QQ) + + assert (a == a) is True + assert (a != a) is False + + assert (a == b) is False + assert (a != b) is True + + b = ANP([QQ(1), QQ(2)], [QQ(1), QQ(0), QQ(1)], QQ) + + assert (a == b) is False + assert (a != b) is True + + +def test_ANP___bool__(): + assert bool(ANP([], [QQ(1), QQ(0), QQ(1)], QQ)) is False + assert bool(ANP([QQ(1)], [QQ(1), QQ(0), QQ(1)], QQ)) is True + + +def test_ANP_properties(): + mod = [QQ(1), QQ(0), QQ(1)] + + assert ANP([QQ(0)], mod, QQ).is_zero is True + assert ANP([QQ(1)], mod, QQ).is_zero is False + + assert ANP([QQ(1)], mod, QQ).is_one is True + assert ANP([QQ(2)], mod, QQ).is_one is False + + +def test_ANP_arithmetics(): + mod = [QQ(1), QQ(0), QQ(0), QQ(-2)] + + a = ANP([QQ(2), QQ(-1), QQ(1)], mod, QQ) + b = ANP([QQ(1), QQ(2)], mod, QQ) + + c = ANP([QQ(-2), QQ(1), QQ(-1)], mod, QQ) + + assert a.neg() == -a == c + + c = ANP([QQ(2), QQ(0), QQ(3)], mod, QQ) + + assert a.add(b) == a + b == c + assert b.add(a) == b + a == c + + c = ANP([QQ(2), QQ(-2), QQ(-1)], mod, QQ) + + assert a.sub(b) == a - b == c + + c = ANP([QQ(-2), QQ(2), QQ(1)], mod, QQ) + + assert b.sub(a) == b - a == c + + c = ANP([QQ(3), QQ(-1), QQ(6)], mod, QQ) + + assert a.mul(b) == a*b == c + assert b.mul(a) == b*a == c + + c = ANP([QQ(-1, 43), QQ(9, 43), QQ(5, 43)], mod, QQ) + + assert a.pow(0) == a**(0) == ANP(1, mod, QQ) + assert a.pow(1) == a**(1) == a + + assert a.pow(-1) == a**(-1) == c + + assert a.quo(a) == a.mul(a.pow(-1)) == a*a**(-1) == ANP(1, mod, QQ) + + c = ANP([], [1, 0, 0, -2], QQ) + r1 = a.rem(b) + + (q, r2) = a.div(b) + + assert r1 == r2 == c == a % b + + raises(NotInvertible, lambda: a.div(c)) + raises(NotInvertible, lambda: a.rem(c)) + + # Comparison with "hard-coded" value fails despite looking identical + # from sympy import Rational + # c = ANP([Rational(11, 10), Rational(-1, 5), Rational(-3, 5)], [1, 0, 0, -2], QQ) + + assert q == a/b # == c + +def test_ANP_unify(): + mod_z = [ZZ(1), ZZ(0), ZZ(-2)] + mod_q = [QQ(1), QQ(0), QQ(-2)] + + a = ANP([QQ(1)], mod_q, QQ) + b = ANP([ZZ(1)], mod_z, ZZ) + + assert a.unify(b)[0] == QQ + assert b.unify(a)[0] == QQ + assert a.unify(a)[0] == QQ + assert b.unify(b)[0] == ZZ + + assert a.unify_ANP(b)[-1] == QQ + assert b.unify_ANP(a)[-1] == QQ + assert a.unify_ANP(a)[-1] == QQ + assert b.unify_ANP(b)[-1] == ZZ + + +def test_zero_poly(): + from sympy import Symbol + x = Symbol('x') + + R_old = ZZ.old_poly_ring(x) + zero_poly_old = R_old(0) + cont_old, prim_old = zero_poly_old.primitive() + + assert cont_old == 0 + assert prim_old == zero_poly_old + assert prim_old.is_primitive is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyfuncs.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyfuncs.py new file mode 100644 index 0000000000000000000000000000000000000000..496f63bf14e4dd9f68cf653004eb35a3ed7615ca --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyfuncs.py @@ -0,0 +1,126 @@ +"""Tests for high-level polynomials manipulation functions. """ + +from sympy.polys.polyfuncs import ( + symmetrize, horner, interpolate, rational_interpolate, viete, +) + +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, +) + +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.testing.pytest import raises + +from sympy.abc import a, b, c, d, e, x, y, z + + +def test_symmetrize(): + assert symmetrize(0, x, y, z) == (0, 0) + assert symmetrize(1, x, y, z) == (1, 0) + + s1 = x + y + z + s2 = x*y + x*z + y*z + + assert symmetrize(1) == (1, 0) + assert symmetrize(1, formal=True) == (1, 0, []) + + assert symmetrize(x) == (x, 0) + assert symmetrize(x + 1) == (x + 1, 0) + + assert symmetrize(x, x, y) == (x + y, -y) + assert symmetrize(x + 1, x, y) == (x + y + 1, -y) + + assert symmetrize(x, x, y, z) == (s1, -y - z) + assert symmetrize(x + 1, x, y, z) == (s1 + 1, -y - z) + + assert symmetrize(x**2, x, y, z) == (s1**2 - 2*s2, -y**2 - z**2) + + assert symmetrize(x**2 + y**2) == (-2*x*y + (x + y)**2, 0) + assert symmetrize(x**2 - y**2) == (-2*x*y + (x + y)**2, -2*y**2) + + assert symmetrize(x**3 + y**2 + a*x**2 + b*y**3, x, y) == \ + (-3*x*y*(x + y) - 2*a*x*y + a*(x + y)**2 + (x + y)**3, + y**2*(1 - a) + y**3*(b - 1)) + + U = [u0, u1, u2] = symbols('u:3') + + assert symmetrize(x + 1, x, y, z, formal=True, symbols=U) == \ + (u0 + 1, -y - z, [(u0, x + y + z), (u1, x*y + x*z + y*z), (u2, x*y*z)]) + + assert symmetrize([1, 2, 3]) == [(1, 0), (2, 0), (3, 0)] + assert symmetrize([1, 2, 3], formal=True) == ([(1, 0), (2, 0), (3, 0)], []) + + assert symmetrize([x + y, x - y]) == [(x + y, 0), (x + y, -2*y)] + + +def test_horner(): + assert horner(0) == 0 + assert horner(1) == 1 + assert horner(x) == x + + assert horner(x + 1) == x + 1 + assert horner(x**2 + 1) == x**2 + 1 + assert horner(x**2 + x) == (x + 1)*x + assert horner(x**2 + x + 1) == (x + 1)*x + 1 + + assert horner( + 9*x**4 + 8*x**3 + 7*x**2 + 6*x + 5) == (((9*x + 8)*x + 7)*x + 6)*x + 5 + assert horner( + a*x**4 + b*x**3 + c*x**2 + d*x + e) == (((a*x + b)*x + c)*x + d)*x + e + + assert horner(4*x**2*y**2 + 2*x**2*y + 2*x*y**2 + x*y, wrt=x) == (( + 4*y + 2)*x*y + (2*y + 1)*y)*x + assert horner(4*x**2*y**2 + 2*x**2*y + 2*x*y**2 + x*y, wrt=y) == (( + 4*x + 2)*y*x + (2*x + 1)*x)*y + + +def test_interpolate(): + assert interpolate([1, 4, 9, 16], x) == x**2 + assert interpolate([1, 4, 9, 25], x) == S(3)*x**3/2 - S(8)*x**2 + S(33)*x/2 - 9 + assert interpolate([(1, 1), (2, 4), (3, 9)], x) == x**2 + assert interpolate([(1, 2), (2, 5), (3, 10)], x) == 1 + x**2 + assert interpolate({1: 2, 2: 5, 3: 10}, x) == 1 + x**2 + assert interpolate({5: 2, 7: 5, 8: 10, 9: 13}, x) == \ + -S(13)*x**3/24 + S(12)*x**2 - S(2003)*x/24 + 187 + assert interpolate([(1, 3), (0, 6), (2, 5), (5, 7), (-2, 4)], x) == \ + S(-61)*x**4/280 + S(247)*x**3/210 + S(139)*x**2/280 - S(1871)*x/420 + 6 + assert interpolate((9, 4, 9), 3) == 9 + assert interpolate((1, 9, 16), 1) is S.One + assert interpolate(((x, 1), (2, 3)), x) is S.One + assert interpolate({x: 1, 2: 3}, x) is S.One + assert interpolate(((2, x), (1, 3)), x) == x**2 - 4*x + 6 + + +def test_rational_interpolate(): + x, y = symbols('x,y') + xdata = [1, 2, 3, 4, 5, 6] + ydata1 = [120, 150, 200, 255, 312, 370] + ydata2 = [-210, -35, 105, 231, 350, 465] + assert rational_interpolate(list(zip(xdata, ydata1)), 2) == ( + (60*x**2 + 60)/x ) + assert rational_interpolate(list(zip(xdata, ydata1)), 3) == ( + (60*x**2 + 60)/x ) + assert rational_interpolate(list(zip(xdata, ydata2)), 2, X=y) == ( + (105*y**2 - 525)/(y + 1) ) + xdata = list(range(1,11)) + ydata = [-1923885361858460, -5212158811973685, -9838050145867125, + -15662936261217245, -22469424125057910, -30073793365223685, + -38332297297028735, -47132954289530109, -56387719094026320, + -66026548943876885] + assert rational_interpolate(list(zip(xdata, ydata)), 5) == ( + (-12986226192544605*x**4 + + 8657484128363070*x**3 - 30301194449270745*x**2 + 4328742064181535*x + - 4328742064181535)/(x**3 + 9*x**2 - 3*x + 11)) + + +def test_viete(): + r1, r2 = symbols('r1, r2') + + assert viete( + a*x**2 + b*x + c, [r1, r2], x) == [(r1 + r2, -b/a), (r1*r2, c/a)] + + raises(ValueError, lambda: viete(1, [], x)) + raises(ValueError, lambda: viete(x**2 + 1, [r1])) + + raises(MultivariatePolynomialError, lambda: viete(x + y, [r1])) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polymatrix.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polymatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..287f23d537392510acda094e764a8c3dbbd1ef73 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polymatrix.py @@ -0,0 +1,185 @@ +from sympy.testing.pytest import raises + +from sympy.polys.polymatrix import PolyMatrix +from sympy.polys import Poly + +from sympy.core.singleton import S +from sympy.matrices.dense import Matrix +from sympy.polys.domains.integerring import ZZ +from sympy.polys.domains.rationalfield import QQ + +from sympy.abc import x, y + + +def _test_polymatrix(): + pm1 = PolyMatrix([[Poly(x**2, x), Poly(-x, x)], [Poly(x**3, x), Poly(-1 + x, x)]]) + v1 = PolyMatrix([[1, 0], [-1, 0]], ring='ZZ[x]') + m1 = PolyMatrix([[1, 0], [-1, 0]], ring='ZZ[x]') + A = PolyMatrix([[Poly(x**2 + x, x), Poly(0, x)], \ + [Poly(x**3 - x + 1, x), Poly(0, x)]]) + B = PolyMatrix([[Poly(x**2, x), Poly(-x, x)], [Poly(-x**2, x), Poly(x, x)]]) + assert A.ring == ZZ[x] + assert isinstance(pm1*v1, PolyMatrix) + assert pm1*v1 == A + assert pm1*m1 == A + assert v1*pm1 == B + + pm2 = PolyMatrix([[Poly(x**2, x, domain='QQ'), Poly(0, x, domain='QQ'), Poly(-x**2, x, domain='QQ'), \ + Poly(x**3, x, domain='QQ'), Poly(0, x, domain='QQ'), Poly(-x**3, x, domain='QQ')]]) + assert pm2.ring == QQ[x] + v2 = PolyMatrix([1, 0, 0, 0, 0, 0], ring='ZZ[x]') + m2 = PolyMatrix([1, 0, 0, 0, 0, 0], ring='ZZ[x]') + C = PolyMatrix([[Poly(x**2, x, domain='QQ')]]) + assert pm2*v2 == C + assert pm2*m2 == C + + pm3 = PolyMatrix([[Poly(x**2, x), S.One]], ring='ZZ[x]') + v3 = S.Half*pm3 + assert v3 == PolyMatrix([[Poly(S.Half*x**2, x, domain='QQ'), S.Half]], ring='QQ[x]') + assert pm3*S.Half == v3 + assert v3.ring == QQ[x] + + pm4 = PolyMatrix([[Poly(x**2, x, domain='ZZ'), Poly(-x**2, x, domain='ZZ')]]) + v4 = PolyMatrix([1, -1], ring='ZZ[x]') + assert pm4*v4 == PolyMatrix([[Poly(2*x**2, x, domain='ZZ')]]) + + assert len(PolyMatrix(ring=ZZ[x])) == 0 + assert PolyMatrix([1, 0, 0, 1], x)/(-1) == PolyMatrix([-1, 0, 0, -1], x) + + +def test_polymatrix_constructor(): + M1 = PolyMatrix([[x, y]], ring=QQ[x,y]) + assert M1.ring == QQ[x,y] + assert M1.domain == QQ + assert M1.gens == (x, y) + assert M1.shape == (1, 2) + assert M1.rows == 1 + assert M1.cols == 2 + assert len(M1) == 2 + assert list(M1) == [Poly(x, (x, y), domain=QQ), Poly(y, (x, y), domain=QQ)] + + M2 = PolyMatrix([[x, y]], ring=QQ[x][y]) + assert M2.ring == QQ[x][y] + assert M2.domain == QQ[x] + assert M2.gens == (y,) + assert M2.shape == (1, 2) + assert M2.rows == 1 + assert M2.cols == 2 + assert len(M2) == 2 + assert list(M2) == [Poly(x, (y,), domain=QQ[x]), Poly(y, (y,), domain=QQ[x])] + + assert PolyMatrix([[x, y]], y) == PolyMatrix([[x, y]], ring=ZZ.frac_field(x)[y]) + assert PolyMatrix([[x, y]], ring='ZZ[x,y]') == PolyMatrix([[x, y]], ring=ZZ[x,y]) + + assert PolyMatrix([[x, y]], (x, y)) == PolyMatrix([[x, y]], ring=QQ[x,y]) + assert PolyMatrix([[x, y]], x, y) == PolyMatrix([[x, y]], ring=QQ[x,y]) + assert PolyMatrix([x, y]) == PolyMatrix([[x], [y]], ring=QQ[x,y]) + assert PolyMatrix(1, 2, [x, y]) == PolyMatrix([[x, y]], ring=QQ[x,y]) + assert PolyMatrix(1, 2, lambda i,j: [x,y][j]) == PolyMatrix([[x, y]], ring=QQ[x,y]) + assert PolyMatrix(0, 2, [], x, y).shape == (0, 2) + assert PolyMatrix(2, 0, [], x, y).shape == (2, 0) + assert PolyMatrix([[], []], x, y).shape == (2, 0) + assert PolyMatrix(ring=QQ[x,y]) == PolyMatrix(0, 0, [], ring=QQ[x,y]) == PolyMatrix([], ring=QQ[x,y]) + raises(TypeError, lambda: PolyMatrix()) + raises(TypeError, lambda: PolyMatrix(1)) + + assert PolyMatrix([Poly(x), Poly(y)]) == PolyMatrix([[x], [y]], ring=ZZ[x,y]) + + # XXX: Maybe a bug in parallel_poly_from_expr (x lost from gens and domain): + assert PolyMatrix([Poly(y, x), 1]) == PolyMatrix([[y], [1]], ring=QQ[y]) + + +def test_polymatrix_eq(): + assert (PolyMatrix([x]) == PolyMatrix([x])) is True + assert (PolyMatrix([y]) == PolyMatrix([x])) is False + assert (PolyMatrix([x]) != PolyMatrix([x])) is False + assert (PolyMatrix([y]) != PolyMatrix([x])) is True + + assert PolyMatrix([[x, y]]) != PolyMatrix([x, y]) == PolyMatrix([[x], [y]]) + + assert PolyMatrix([x], ring=QQ[x]) != PolyMatrix([x], ring=ZZ[x]) + + assert PolyMatrix([x]) != Matrix([x]) + assert PolyMatrix([x]).to_Matrix() == Matrix([x]) + + assert PolyMatrix([1], x) == PolyMatrix([1], x) + assert PolyMatrix([1], x) != PolyMatrix([1], y) + + +def test_polymatrix_from_Matrix(): + assert PolyMatrix.from_Matrix(Matrix([1, 2]), x) == PolyMatrix([1, 2], x, ring=QQ[x]) + assert PolyMatrix.from_Matrix(Matrix([1]), ring=QQ[x]) == PolyMatrix([1], x) + pmx = PolyMatrix([1, 2], x) + pmy = PolyMatrix([1, 2], y) + assert pmx != pmy + assert pmx.set_gens(y) == pmy + + +def test_polymatrix_repr(): + assert repr(PolyMatrix([[1, 2]], x)) == 'PolyMatrix([[1, 2]], ring=QQ[x])' + assert repr(PolyMatrix(0, 2, [], x)) == 'PolyMatrix(0, 2, [], ring=QQ[x])' + + +def test_polymatrix_getitem(): + M = PolyMatrix([[1, 2], [3, 4]], x) + assert M[:, :] == M + assert M[0, :] == PolyMatrix([[1, 2]], x) + assert M[:, 0] == PolyMatrix([1, 3], x) + assert M[0, 0] == Poly(1, x, domain=QQ) + assert M[0] == Poly(1, x, domain=QQ) + assert M[:2] == [Poly(1, x, domain=QQ), Poly(2, x, domain=QQ)] + + +def test_polymatrix_arithmetic(): + M = PolyMatrix([[1, 2], [3, 4]], x) + assert M + M == PolyMatrix([[2, 4], [6, 8]], x) + assert M - M == PolyMatrix([[0, 0], [0, 0]], x) + assert -M == PolyMatrix([[-1, -2], [-3, -4]], x) + raises(TypeError, lambda: M + 1) + raises(TypeError, lambda: M - 1) + raises(TypeError, lambda: 1 + M) + raises(TypeError, lambda: 1 - M) + + assert M * M == PolyMatrix([[7, 10], [15, 22]], x) + assert 2 * M == PolyMatrix([[2, 4], [6, 8]], x) + assert M * 2 == PolyMatrix([[2, 4], [6, 8]], x) + assert S(2) * M == PolyMatrix([[2, 4], [6, 8]], x) + assert M * S(2) == PolyMatrix([[2, 4], [6, 8]], x) + raises(TypeError, lambda: [] * M) + raises(TypeError, lambda: M * []) + M2 = PolyMatrix([[1, 2]], ring=ZZ[x]) + assert S.Half * M2 == PolyMatrix([[S.Half, 1]], ring=QQ[x]) + assert M2 * S.Half == PolyMatrix([[S.Half, 1]], ring=QQ[x]) + + assert M / 2 == PolyMatrix([[S(1)/2, 1], [S(3)/2, 2]], x) + assert M / Poly(2, x) == PolyMatrix([[S(1)/2, 1], [S(3)/2, 2]], x) + raises(TypeError, lambda: M / []) + + +def test_polymatrix_manipulations(): + M1 = PolyMatrix([[1, 2], [3, 4]], x) + assert M1.transpose() == PolyMatrix([[1, 3], [2, 4]], x) + M2 = PolyMatrix([[5, 6], [7, 8]], x) + assert M1.row_join(M2) == PolyMatrix([[1, 2, 5, 6], [3, 4, 7, 8]], x) + assert M1.col_join(M2) == PolyMatrix([[1, 2], [3, 4], [5, 6], [7, 8]], x) + assert M1.applyfunc(lambda e: 2*e) == PolyMatrix([[2, 4], [6, 8]], x) + + +def test_polymatrix_ones_zeros(): + assert PolyMatrix.zeros(1, 2, x) == PolyMatrix([[0, 0]], x) + assert PolyMatrix.eye(2, x) == PolyMatrix([[1, 0], [0, 1]], x) + + +def test_polymatrix_rref(): + M = PolyMatrix([[1, 2], [3, 4]], x) + assert M.rref() == (PolyMatrix.eye(2, x), (0, 1)) + raises(ValueError, lambda: PolyMatrix([1, 2], ring=ZZ[x]).rref()) + raises(ValueError, lambda: PolyMatrix([1, x], ring=QQ[x]).rref()) + + +def test_polymatrix_nullspace(): + M = PolyMatrix([[1, 2], [3, 6]], x) + assert M.nullspace() == [PolyMatrix([-2, 1], x)] + raises(ValueError, lambda: PolyMatrix([1, 2], ring=ZZ[x]).nullspace()) + raises(ValueError, lambda: PolyMatrix([1, x], ring=QQ[x]).nullspace()) + assert M.rank() == 1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyoptions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyoptions.py new file mode 100644 index 0000000000000000000000000000000000000000..fa2e6054bad43aef5470949180ea5c2ffdc11f30 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyoptions.py @@ -0,0 +1,485 @@ +"""Tests for options manager for :class:`Poly` and public API functions. """ + +from sympy.polys.polyoptions import ( + Options, Expand, Gens, Wrt, Sort, Order, Field, Greedy, Domain, + Split, Gaussian, Extension, Modulus, Symmetric, Strict, Auto, + Frac, Formal, Polys, Include, All, Gen, Symbols, Method) + +from sympy.polys.orderings import lex +from sympy.polys.domains import FF, GF, ZZ, QQ, QQ_I, RR, CC, EX + +from sympy.polys.polyerrors import OptionError, GeneratorsError + +from sympy.core.numbers import (I, Integer) +from sympy.core.symbol import Symbol +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.testing.pytest import raises +from sympy.abc import x, y, z + + +def test_Options_clone(): + opt = Options((x, y, z), {'domain': 'ZZ'}) + + assert opt.gens == (x, y, z) + assert opt.domain == ZZ + assert ('order' in opt) is False + + new_opt = opt.clone({'gens': (x, y), 'order': 'lex'}) + + assert opt.gens == (x, y, z) + assert opt.domain == ZZ + assert ('order' in opt) is False + + assert new_opt.gens == (x, y) + assert new_opt.domain == ZZ + assert ('order' in new_opt) is True + + +def test_Expand_preprocess(): + assert Expand.preprocess(False) is False + assert Expand.preprocess(True) is True + + assert Expand.preprocess(0) is False + assert Expand.preprocess(1) is True + + raises(OptionError, lambda: Expand.preprocess(x)) + + +def test_Expand_postprocess(): + opt = {'expand': True} + Expand.postprocess(opt) + + assert opt == {'expand': True} + + +def test_Gens_preprocess(): + assert Gens.preprocess((None,)) == () + assert Gens.preprocess((x, y, z)) == (x, y, z) + assert Gens.preprocess(((x, y, z),)) == (x, y, z) + + a = Symbol('a', commutative=False) + + raises(GeneratorsError, lambda: Gens.preprocess((x, x, y))) + raises(GeneratorsError, lambda: Gens.preprocess((x, y, a))) + + +def test_Gens_postprocess(): + opt = {'gens': (x, y)} + Gens.postprocess(opt) + + assert opt == {'gens': (x, y)} + + +def test_Wrt_preprocess(): + assert Wrt.preprocess(x) == ['x'] + assert Wrt.preprocess('') == [] + assert Wrt.preprocess(' ') == [] + assert Wrt.preprocess('x,y') == ['x', 'y'] + assert Wrt.preprocess('x y') == ['x', 'y'] + assert Wrt.preprocess('x, y') == ['x', 'y'] + assert Wrt.preprocess('x , y') == ['x', 'y'] + assert Wrt.preprocess(' x, y') == ['x', 'y'] + assert Wrt.preprocess(' x, y') == ['x', 'y'] + assert Wrt.preprocess([x, y]) == ['x', 'y'] + + raises(OptionError, lambda: Wrt.preprocess(',')) + raises(OptionError, lambda: Wrt.preprocess(0)) + + +def test_Wrt_postprocess(): + opt = {'wrt': ['x']} + Wrt.postprocess(opt) + + assert opt == {'wrt': ['x']} + + +def test_Sort_preprocess(): + assert Sort.preprocess([x, y, z]) == ['x', 'y', 'z'] + assert Sort.preprocess((x, y, z)) == ['x', 'y', 'z'] + + assert Sort.preprocess('x > y > z') == ['x', 'y', 'z'] + assert Sort.preprocess('x>y>z') == ['x', 'y', 'z'] + + raises(OptionError, lambda: Sort.preprocess(0)) + raises(OptionError, lambda: Sort.preprocess({x, y, z})) + + +def test_Sort_postprocess(): + opt = {'sort': 'x > y'} + Sort.postprocess(opt) + + assert opt == {'sort': 'x > y'} + + +def test_Order_preprocess(): + assert Order.preprocess('lex') == lex + + +def test_Order_postprocess(): + opt = {'order': True} + Order.postprocess(opt) + + assert opt == {'order': True} + + +def test_Field_preprocess(): + assert Field.preprocess(False) is False + assert Field.preprocess(True) is True + + assert Field.preprocess(0) is False + assert Field.preprocess(1) is True + + raises(OptionError, lambda: Field.preprocess(x)) + + +def test_Field_postprocess(): + opt = {'field': True} + Field.postprocess(opt) + + assert opt == {'field': True} + + +def test_Greedy_preprocess(): + assert Greedy.preprocess(False) is False + assert Greedy.preprocess(True) is True + + assert Greedy.preprocess(0) is False + assert Greedy.preprocess(1) is True + + raises(OptionError, lambda: Greedy.preprocess(x)) + + +def test_Greedy_postprocess(): + opt = {'greedy': True} + Greedy.postprocess(opt) + + assert opt == {'greedy': True} + + +def test_Domain_preprocess(): + assert Domain.preprocess(ZZ) == ZZ + assert Domain.preprocess(QQ) == QQ + assert Domain.preprocess(EX) == EX + assert Domain.preprocess(FF(2)) == FF(2) + assert Domain.preprocess(ZZ[x, y]) == ZZ[x, y] + + assert Domain.preprocess('Z') == ZZ + assert Domain.preprocess('Q') == QQ + + assert Domain.preprocess('ZZ') == ZZ + assert Domain.preprocess('QQ') == QQ + + assert Domain.preprocess('EX') == EX + + assert Domain.preprocess('FF(23)') == FF(23) + assert Domain.preprocess('GF(23)') == GF(23) + + raises(OptionError, lambda: Domain.preprocess('Z[]')) + + assert Domain.preprocess('Z[x]') == ZZ[x] + assert Domain.preprocess('Q[x]') == QQ[x] + assert Domain.preprocess('R[x]') == RR[x] + assert Domain.preprocess('C[x]') == CC[x] + + assert Domain.preprocess('ZZ[x]') == ZZ[x] + assert Domain.preprocess('QQ[x]') == QQ[x] + assert Domain.preprocess('RR[x]') == RR[x] + assert Domain.preprocess('CC[x]') == CC[x] + + assert Domain.preprocess('Z[x,y]') == ZZ[x, y] + assert Domain.preprocess('Q[x,y]') == QQ[x, y] + assert Domain.preprocess('R[x,y]') == RR[x, y] + assert Domain.preprocess('C[x,y]') == CC[x, y] + + assert Domain.preprocess('ZZ[x,y]') == ZZ[x, y] + assert Domain.preprocess('QQ[x,y]') == QQ[x, y] + assert Domain.preprocess('RR[x,y]') == RR[x, y] + assert Domain.preprocess('CC[x,y]') == CC[x, y] + + raises(OptionError, lambda: Domain.preprocess('Z()')) + + assert Domain.preprocess('Z(x)') == ZZ.frac_field(x) + assert Domain.preprocess('Q(x)') == QQ.frac_field(x) + + assert Domain.preprocess('ZZ(x)') == ZZ.frac_field(x) + assert Domain.preprocess('QQ(x)') == QQ.frac_field(x) + + assert Domain.preprocess('Z(x,y)') == ZZ.frac_field(x, y) + assert Domain.preprocess('Q(x,y)') == QQ.frac_field(x, y) + + assert Domain.preprocess('ZZ(x,y)') == ZZ.frac_field(x, y) + assert Domain.preprocess('QQ(x,y)') == QQ.frac_field(x, y) + + assert Domain.preprocess('Q') == QQ.algebraic_field(I) + assert Domain.preprocess('QQ') == QQ.algebraic_field(I) + + assert Domain.preprocess('Q') == QQ.algebraic_field(sqrt(2), I) + assert Domain.preprocess( + 'QQ') == QQ.algebraic_field(sqrt(2), I) + + raises(OptionError, lambda: Domain.preprocess('abc')) + + +def test_Domain_postprocess(): + raises(GeneratorsError, lambda: Domain.postprocess({'gens': (x, y), + 'domain': ZZ[y, z]})) + + raises(GeneratorsError, lambda: Domain.postprocess({'gens': (), + 'domain': EX})) + raises(GeneratorsError, lambda: Domain.postprocess({'domain': EX})) + + +def test_Split_preprocess(): + assert Split.preprocess(False) is False + assert Split.preprocess(True) is True + + assert Split.preprocess(0) is False + assert Split.preprocess(1) is True + + raises(OptionError, lambda: Split.preprocess(x)) + + +def test_Split_postprocess(): + raises(NotImplementedError, lambda: Split.postprocess({'split': True})) + + +def test_Gaussian_preprocess(): + assert Gaussian.preprocess(False) is False + assert Gaussian.preprocess(True) is True + + assert Gaussian.preprocess(0) is False + assert Gaussian.preprocess(1) is True + + raises(OptionError, lambda: Gaussian.preprocess(x)) + + +def test_Gaussian_postprocess(): + opt = {'gaussian': True} + Gaussian.postprocess(opt) + + assert opt == { + 'gaussian': True, + 'domain': QQ_I, + } + + +def test_Extension_preprocess(): + assert Extension.preprocess(True) is True + assert Extension.preprocess(1) is True + + assert Extension.preprocess([]) is None + + assert Extension.preprocess(sqrt(2)) == {sqrt(2)} + assert Extension.preprocess([sqrt(2)]) == {sqrt(2)} + + assert Extension.preprocess([sqrt(2), I]) == {sqrt(2), I} + + raises(OptionError, lambda: Extension.preprocess(False)) + raises(OptionError, lambda: Extension.preprocess(0)) + + +def test_Extension_postprocess(): + opt = {'extension': {sqrt(2)}} + Extension.postprocess(opt) + + assert opt == { + 'extension': {sqrt(2)}, + 'domain': QQ.algebraic_field(sqrt(2)), + } + + opt = {'extension': True} + Extension.postprocess(opt) + + assert opt == {'extension': True} + + +def test_Modulus_preprocess(): + assert Modulus.preprocess(23) == 23 + assert Modulus.preprocess(Integer(23)) == 23 + + raises(OptionError, lambda: Modulus.preprocess(0)) + raises(OptionError, lambda: Modulus.preprocess(x)) + + +def test_Modulus_postprocess(): + opt = {'modulus': 5} + Modulus.postprocess(opt) + + assert opt == { + 'modulus': 5, + 'domain': FF(5), + } + + opt = {'modulus': 5, 'symmetric': False} + Modulus.postprocess(opt) + + assert opt == { + 'modulus': 5, + 'domain': FF(5, False), + 'symmetric': False, + } + + +def test_Symmetric_preprocess(): + assert Symmetric.preprocess(False) is False + assert Symmetric.preprocess(True) is True + + assert Symmetric.preprocess(0) is False + assert Symmetric.preprocess(1) is True + + raises(OptionError, lambda: Symmetric.preprocess(x)) + + +def test_Symmetric_postprocess(): + opt = {'symmetric': True} + Symmetric.postprocess(opt) + + assert opt == {'symmetric': True} + + +def test_Strict_preprocess(): + assert Strict.preprocess(False) is False + assert Strict.preprocess(True) is True + + assert Strict.preprocess(0) is False + assert Strict.preprocess(1) is True + + raises(OptionError, lambda: Strict.preprocess(x)) + + +def test_Strict_postprocess(): + opt = {'strict': True} + Strict.postprocess(opt) + + assert opt == {'strict': True} + + +def test_Auto_preprocess(): + assert Auto.preprocess(False) is False + assert Auto.preprocess(True) is True + + assert Auto.preprocess(0) is False + assert Auto.preprocess(1) is True + + raises(OptionError, lambda: Auto.preprocess(x)) + + +def test_Auto_postprocess(): + opt = {'auto': True} + Auto.postprocess(opt) + + assert opt == {'auto': True} + + +def test_Frac_preprocess(): + assert Frac.preprocess(False) is False + assert Frac.preprocess(True) is True + + assert Frac.preprocess(0) is False + assert Frac.preprocess(1) is True + + raises(OptionError, lambda: Frac.preprocess(x)) + + +def test_Frac_postprocess(): + opt = {'frac': True} + Frac.postprocess(opt) + + assert opt == {'frac': True} + + +def test_Formal_preprocess(): + assert Formal.preprocess(False) is False + assert Formal.preprocess(True) is True + + assert Formal.preprocess(0) is False + assert Formal.preprocess(1) is True + + raises(OptionError, lambda: Formal.preprocess(x)) + + +def test_Formal_postprocess(): + opt = {'formal': True} + Formal.postprocess(opt) + + assert opt == {'formal': True} + + +def test_Polys_preprocess(): + assert Polys.preprocess(False) is False + assert Polys.preprocess(True) is True + + assert Polys.preprocess(0) is False + assert Polys.preprocess(1) is True + + raises(OptionError, lambda: Polys.preprocess(x)) + + +def test_Polys_postprocess(): + opt = {'polys': True} + Polys.postprocess(opt) + + assert opt == {'polys': True} + + +def test_Include_preprocess(): + assert Include.preprocess(False) is False + assert Include.preprocess(True) is True + + assert Include.preprocess(0) is False + assert Include.preprocess(1) is True + + raises(OptionError, lambda: Include.preprocess(x)) + + +def test_Include_postprocess(): + opt = {'include': True} + Include.postprocess(opt) + + assert opt == {'include': True} + + +def test_All_preprocess(): + assert All.preprocess(False) is False + assert All.preprocess(True) is True + + assert All.preprocess(0) is False + assert All.preprocess(1) is True + + raises(OptionError, lambda: All.preprocess(x)) + + +def test_All_postprocess(): + opt = {'all': True} + All.postprocess(opt) + + assert opt == {'all': True} + + +def test_Gen_postprocess(): + opt = {'gen': x} + Gen.postprocess(opt) + + assert opt == {'gen': x} + + +def test_Symbols_preprocess(): + raises(OptionError, lambda: Symbols.preprocess(x)) + + +def test_Symbols_postprocess(): + opt = {'symbols': [x, y, z]} + Symbols.postprocess(opt) + + assert opt == {'symbols': [x, y, z]} + + +def test_Method_preprocess(): + raises(OptionError, lambda: Method.preprocess(10)) + + +def test_Method_postprocess(): + opt = {'method': 'f5b'} + Method.postprocess(opt) + + assert opt == {'method': 'f5b'} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyroots.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyroots.py new file mode 100644 index 0000000000000000000000000000000000000000..7f96b1930f6789ce3150ae2c920ba7d9faa68791 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyroots.py @@ -0,0 +1,758 @@ +"""Tests for algorithms for computing symbolic roots of polynomials. """ + +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.functions.elementary.complexes import (conjugate, im, re) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acos, cos, sin) +from sympy.polys.domains.integerring import ZZ +from sympy.sets.sets import Interval +from sympy.simplify.powsimp import powsimp + +from sympy.polys import Poly, cyclotomic_poly, intervals, nroots, rootof + +from sympy.polys.polyroots import (root_factors, roots_linear, + roots_quadratic, roots_cubic, roots_quartic, roots_quintic, + roots_cyclotomic, roots_binomial, preprocess_roots, roots) + +from sympy.polys.orthopolys import legendre_poly +from sympy.polys.polyerrors import PolynomialError, \ + UnsolvableFactorError +from sympy.polys.polyutils import _nsort + +from sympy.testing.pytest import raises, slow +from sympy.core.random import verify_numerically +import mpmath +from itertools import product + + + +a, b, c, d, e, q, t, x, y, z = symbols('a,b,c,d,e,q,t,x,y,z') + + +def _check(roots): + # this is the desired invariant for roots returned + # by all_roots. It is trivially true for linear + # polynomials. + nreal = sum(1 if i.is_real else 0 for i in roots) + assert sorted(roots[:nreal]) == list(roots[:nreal]) + for ix in range(nreal, len(roots), 2): + if not ( + roots[ix + 1] == roots[ix] or + roots[ix + 1] == conjugate(roots[ix])): + return False + return True + + +def test_roots_linear(): + assert roots_linear(Poly(2*x + 1, x)) == [Rational(-1, 2)] + + +def test_roots_quadratic(): + assert roots_quadratic(Poly(2*x**2, x)) == [0, 0] + assert roots_quadratic(Poly(2*x**2 + 3*x, x)) == [Rational(-3, 2), 0] + assert roots_quadratic(Poly(2*x**2 + 3, x)) == [-I*sqrt(6)/2, I*sqrt(6)/2] + assert roots_quadratic(Poly(2*x**2 + 4*x + 3, x)) == [-1 - I*sqrt(2)/2, -1 + I*sqrt(2)/2] + _check(Poly(2*x**2 + 4*x + 3, x).all_roots()) + + f = x**2 + (2*a*e + 2*c*e)/(a - c)*x + (d - b + a*e**2 - c*e**2)/(a - c) + assert roots_quadratic(Poly(f, x)) == \ + [-e*(a + c)/(a - c) - sqrt(a*b + c*d - a*d - b*c + 4*a*c*e**2)/(a - c), + -e*(a + c)/(a - c) + sqrt(a*b + c*d - a*d - b*c + 4*a*c*e**2)/(a - c)] + + # check for simplification + f = Poly(y*x**2 - 2*x - 2*y, x) + assert roots_quadratic(f) == \ + [-sqrt(2*y**2 + 1)/y + 1/y, sqrt(2*y**2 + 1)/y + 1/y] + f = Poly(x**2 + (-y**2 - 2)*x + y**2 + 1, x) + assert roots_quadratic(f) == \ + [1,y**2 + 1] + + f = Poly(sqrt(2)*x**2 - 1, x) + r = roots_quadratic(f) + assert r == _nsort(r) + + # issue 8255 + f = Poly(-24*x**2 - 180*x + 264) + assert [w.n(2) for w in f.all_roots(radicals=True)] == \ + [w.n(2) for w in f.all_roots(radicals=False)] + for _a, _b, _c in product((-2, 2), (-2, 2), (0, -1)): + f = Poly(_a*x**2 + _b*x + _c) + roots = roots_quadratic(f) + assert roots == _nsort(roots) + + +def test_issue_7724(): + eq = Poly(x**4*I + x**2 + I, x) + assert roots(eq) == { + sqrt(I/2 + sqrt(5)*I/2): 1, + sqrt(-sqrt(5)*I/2 + I/2): 1, + -sqrt(I/2 + sqrt(5)*I/2): 1, + -sqrt(-sqrt(5)*I/2 + I/2): 1} + + +def test_issue_8438(): + p = Poly([1, y, -2, -3], x).as_expr() + roots = roots_cubic(Poly(p, x), x) + z = Rational(-3, 2) - I*7/2 # this will fail in code given in commit msg + post = [r.subs(y, z) for r in roots] + assert set(post) == \ + set(roots_cubic(Poly(p.subs(y, z), x))) + # /!\ if p is not made an expression, this is *very* slow + assert all(p.subs({y: z, x: i}).n(2, chop=True) == 0 for i in post) + + +def test_issue_8285(): + roots = (Poly(4*x**8 - 1, x)*Poly(x**2 + 1)).all_roots() + assert _check(roots) + f = Poly(x**4 + 5*x**2 + 6, x) + ro = [rootof(f, i) for i in range(4)] + roots = Poly(x**4 + 5*x**2 + 6, x).all_roots() + assert roots == ro + assert _check(roots) + # more than 2 complex roots from which to identify the + # imaginary ones + roots = Poly(2*x**8 - 1).all_roots() + assert _check(roots) + assert len(Poly(2*x**10 - 1).all_roots()) == 10 # doesn't fail + + +def test_issue_8289(): + roots = (Poly(x**2 + 2)*Poly(x**4 + 2)).all_roots() + assert _check(roots) + roots = Poly(x**6 + 3*x**3 + 2, x).all_roots() + assert _check(roots) + roots = Poly(x**6 - x + 1).all_roots() + assert _check(roots) + # all imaginary roots with multiplicity of 2 + roots = Poly(x**4 + 4*x**2 + 4, x).all_roots() + assert _check(roots) + + +def test_issue_14291(): + assert Poly(((x - 1)**2 + 1)*((x - 1)**2 + 2)*(x - 1) + ).all_roots() == [1, 1 - I, 1 + I, 1 - sqrt(2)*I, 1 + sqrt(2)*I] + p = x**4 + 10*x**2 + 1 + ans = [rootof(p, i) for i in range(4)] + assert Poly(p).all_roots() == ans + _check(ans) + + +def test_issue_13340(): + eq = Poly(y**3 + exp(x)*y + x, y, domain='EX') + roots_d = roots(eq) + assert len(roots_d) == 3 + + +def test_issue_14522(): + eq = Poly(x**4 + x**3*(16 + 32*I) + x**2*(-285 + 386*I) + x*(-2824 - 448*I) - 2058 - 6053*I, x) + roots_eq = roots(eq) + assert all(eq(r) == 0 for r in roots_eq) + + +def test_issue_15076(): + sol = roots_quartic(Poly(t**4 - 6*t**2 + t/x - 3, t)) + assert sol[0].has(x) + + +def test_issue_16589(): + eq = Poly(x**4 - 8*sqrt(2)*x**3 + 4*x**3 - 64*sqrt(2)*x**2 + 1024*x, x) + roots_eq = roots(eq) + assert 0 in roots_eq + + +def test_roots_cubic(): + assert roots_cubic(Poly(2*x**3, x)) == [0, 0, 0] + assert roots_cubic(Poly(x**3 - 3*x**2 + 3*x - 1, x)) == [1, 1, 1] + + # valid for arbitrary y (issue 21263) + r = root(y, 3) + assert roots_cubic(Poly(x**3 - y, x)) == [r, + r*(-S.Half + sqrt(3)*I/2), + r*(-S.Half - sqrt(3)*I/2)] + # simpler form when y is negative + assert roots_cubic(Poly(x**3 - -1, x)) == \ + [-1, S.Half - I*sqrt(3)/2, S.Half + I*sqrt(3)/2] + assert roots_cubic(Poly(2*x**3 - 3*x**2 - 3*x - 1, x))[0] == \ + S.Half + 3**Rational(1, 3)/2 + 3**Rational(2, 3)/2 + eq = -x**3 + 2*x**2 + 3*x - 2 + assert roots(eq, trig=True, multiple=True) == \ + roots_cubic(Poly(eq, x), trig=True) == [ + Rational(2, 3) + 2*sqrt(13)*cos(acos(8*sqrt(13)/169)/3)/3, + -2*sqrt(13)*sin(-acos(8*sqrt(13)/169)/3 + pi/6)/3 + Rational(2, 3), + -2*sqrt(13)*cos(-acos(8*sqrt(13)/169)/3 + pi/3)/3 + Rational(2, 3), + ] + + +def test_roots_quartic(): + assert roots_quartic(Poly(x**4, x)) == [0, 0, 0, 0] + assert roots_quartic(Poly(x**4 + x**3, x)) in [ + [-1, 0, 0, 0], + [0, -1, 0, 0], + [0, 0, -1, 0], + [0, 0, 0, -1] + ] + assert roots_quartic(Poly(x**4 - x**3, x)) in [ + [1, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0], + [0, 0, 0, 1] + ] + + lhs = roots_quartic(Poly(x**4 + x, x)) + rhs = [S.Half + I*sqrt(3)/2, S.Half - I*sqrt(3)/2, S.Zero, -S.One] + + assert sorted(lhs, key=hash) == sorted(rhs, key=hash) + + # test of all branches of roots quartic + for i, (a, b, c, d) in enumerate([(1, 2, 3, 0), + (3, -7, -9, 9), + (1, 2, 3, 4), + (1, 2, 3, 4), + (-7, -3, 3, -6), + (-3, 5, -6, -4), + (6, -5, -10, -3)]): + if i == 2: + c = -a*(a**2/S(8) - b/S(2)) + elif i == 3: + d = a*(a*(a**2*Rational(3, 256) - b/S(16)) + c/S(4)) + eq = x**4 + a*x**3 + b*x**2 + c*x + d + ans = roots_quartic(Poly(eq, x)) + assert all(eq.subs(x, ai).n(chop=True) == 0 for ai in ans) + + # not all symbolic quartics are unresolvable + eq = Poly(q*x + q/4 + x**4 + x**3 + 2*x**2 - Rational(1, 3), x) + sol = roots_quartic(eq) + assert all(verify_numerically(eq.subs(x, i), 0) for i in sol) + z = symbols('z', negative=True) + eq = x**4 + 2*x**3 + 3*x**2 + x*(z + 11) + 5 + zans = roots_quartic(Poly(eq, x)) + assert all(verify_numerically(eq.subs(((x, i), (z, -1))), 0) for i in zans) + # but some are (see also issue 4989) + # it's ok if the solution is not Piecewise, but the tests below should pass + eq = Poly(y*x**4 + x**3 - x + z, x) + ans = roots_quartic(eq) + assert all(type(i) == Piecewise for i in ans) + reps = ( + {"y": Rational(-1, 3), "z": Rational(-1, 4)}, # 4 real + {"y": Rational(-1, 3), "z": Rational(-1, 2)}, # 2 real + {"y": Rational(-1, 3), "z": -2}) # 0 real + for rep in reps: + sol = roots_quartic(Poly(eq.subs(rep), x)) + assert all(verify_numerically(w.subs(rep) - s, 0) for w, s in zip(ans, sol)) + + +def test_issue_21287(): + assert not any(isinstance(i, Piecewise) for i in roots_quartic( + Poly(x**4 - x**2*(3 + 5*I) + 2*x*(-1 + I) - 1 + 3*I, x))) + + +def test_roots_quintic(): + eqs = (x**5 - 2, + (x/2 + 1)**5 - 5*(x/2 + 1) + 12, + x**5 - 110*x**3 - 55*x**2 + 2310*x + 979) + for eq in eqs: + roots = roots_quintic(Poly(eq)) + assert len(roots) == 5 + assert all(eq.subs(x, r.n(10)).n(chop = 1e-5) == 0 for r in roots) + + +def test_roots_cyclotomic(): + assert roots_cyclotomic(cyclotomic_poly(1, x, polys=True)) == [1] + assert roots_cyclotomic(cyclotomic_poly(2, x, polys=True)) == [-1] + assert roots_cyclotomic(cyclotomic_poly( + 3, x, polys=True)) == [Rational(-1, 2) - I*sqrt(3)/2, Rational(-1, 2) + I*sqrt(3)/2] + assert roots_cyclotomic(cyclotomic_poly(4, x, polys=True)) == [-I, I] + assert roots_cyclotomic(cyclotomic_poly( + 6, x, polys=True)) == [S.Half - I*sqrt(3)/2, S.Half + I*sqrt(3)/2] + + assert roots_cyclotomic(cyclotomic_poly(7, x, polys=True)) == [ + -cos(pi/7) - I*sin(pi/7), + -cos(pi/7) + I*sin(pi/7), + -cos(pi*Rational(3, 7)) - I*sin(pi*Rational(3, 7)), + -cos(pi*Rational(3, 7)) + I*sin(pi*Rational(3, 7)), + cos(pi*Rational(2, 7)) - I*sin(pi*Rational(2, 7)), + cos(pi*Rational(2, 7)) + I*sin(pi*Rational(2, 7)), + ] + + assert roots_cyclotomic(cyclotomic_poly(8, x, polys=True)) == [ + -sqrt(2)/2 - I*sqrt(2)/2, + -sqrt(2)/2 + I*sqrt(2)/2, + sqrt(2)/2 - I*sqrt(2)/2, + sqrt(2)/2 + I*sqrt(2)/2, + ] + + assert roots_cyclotomic(cyclotomic_poly(12, x, polys=True)) == [ + -sqrt(3)/2 - I/2, + -sqrt(3)/2 + I/2, + sqrt(3)/2 - I/2, + sqrt(3)/2 + I/2, + ] + + assert roots_cyclotomic( + cyclotomic_poly(1, x, polys=True), factor=True) == [1] + assert roots_cyclotomic( + cyclotomic_poly(2, x, polys=True), factor=True) == [-1] + + assert roots_cyclotomic(cyclotomic_poly(3, x, polys=True), factor=True) == \ + [-root(-1, 3), -1 + root(-1, 3)] + assert roots_cyclotomic(cyclotomic_poly(4, x, polys=True), factor=True) == \ + [-I, I] + assert roots_cyclotomic(cyclotomic_poly(5, x, polys=True), factor=True) == \ + [-root(-1, 5), -root(-1, 5)**3, root(-1, 5)**2, -1 - root(-1, 5)**2 + root(-1, 5) + root(-1, 5)**3] + + assert roots_cyclotomic(cyclotomic_poly(6, x, polys=True), factor=True) == \ + [1 - root(-1, 3), root(-1, 3)] + + +def test_roots_binomial(): + assert roots_binomial(Poly(5*x, x)) == [0] + assert roots_binomial(Poly(5*x**4, x)) == [0, 0, 0, 0] + assert roots_binomial(Poly(5*x + 2, x)) == [Rational(-2, 5)] + + A = 10**Rational(3, 4)/10 + + assert roots_binomial(Poly(5*x**4 + 2, x)) == \ + [-A - A*I, -A + A*I, A - A*I, A + A*I] + _check(roots_binomial(Poly(x**8 - 2))) + + a1 = Symbol('a1', nonnegative=True) + b1 = Symbol('b1', nonnegative=True) + + r0 = roots_quadratic(Poly(a1*x**2 + b1, x)) + r1 = roots_binomial(Poly(a1*x**2 + b1, x)) + + assert powsimp(r0[0]) == powsimp(r1[0]) + assert powsimp(r0[1]) == powsimp(r1[1]) + for a, b, s, n in product((1, 2), (1, 2), (-1, 1), (2, 3, 4, 5)): + if a == b and a != 1: # a == b == 1 is sufficient + continue + p = Poly(a*x**n + s*b) + ans = roots_binomial(p) + assert ans == _nsort(ans) + + # issue 8813 + assert roots(Poly(2*x**3 - 16*y**3, x)) == { + 2*y*(Rational(-1, 2) - sqrt(3)*I/2): 1, + 2*y: 1, + 2*y*(Rational(-1, 2) + sqrt(3)*I/2): 1} + + +def test_roots_preprocessing(): + f = a*y*x**2 + y - b + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 1 + assert poly == Poly(a*y*x**2 + y - b, x) + + f = c**3*x**3 + c**2*x**2 + c*x + a + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 1/c + assert poly == Poly(x**3 + x**2 + x + a, x) + + f = c**3*x**3 + c**2*x**2 + a + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 1/c + assert poly == Poly(x**3 + x**2 + a, x) + + f = c**3*x**3 + c*x + a + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 1/c + assert poly == Poly(x**3 + x + a, x) + + f = c**3*x**3 + a + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 1/c + assert poly == Poly(x**3 + a, x) + + E, F, J, L = symbols("E,F,J,L") + + f = -21601054687500000000*E**8*J**8/L**16 + \ + 508232812500000000*F*x*E**7*J**7/L**14 - \ + 4269543750000000*E**6*F**2*J**6*x**2/L**12 + \ + 16194716250000*E**5*F**3*J**5*x**3/L**10 - \ + 27633173750*E**4*F**4*J**4*x**4/L**8 + \ + 14840215*E**3*F**5*J**3*x**5/L**6 + \ + 54794*E**2*F**6*J**2*x**6/(5*L**4) - \ + 1153*E*J*F**7*x**7/(80*L**2) + \ + 633*F**8*x**8/160000 + + coeff, poly = preprocess_roots(Poly(f, x)) + + assert coeff == 20*E*J/(F*L**2) + assert poly == 633*x**8 - 115300*x**7 + 4383520*x**6 + 296804300*x**5 - 27633173750*x**4 + \ + 809735812500*x**3 - 10673859375000*x**2 + 63529101562500*x - 135006591796875 + + f = Poly(-y**2 + x**2*exp(x), y, domain=ZZ[x, exp(x)]) + g = Poly(-y**2 + exp(x), y, domain=ZZ[exp(x)]) + + assert preprocess_roots(f) == (x, g) + + +def test_roots0(): + assert roots(1, x) == {} + assert roots(x, x) == {S.Zero: 1} + assert roots(x**9, x) == {S.Zero: 9} + assert roots(((x - 2)*(x + 3)*(x - 4)).expand(), x) == {-S(3): 1, S(2): 1, S(4): 1} + + assert roots(2*x + 1, x) == {Rational(-1, 2): 1} + assert roots((2*x + 1)**2, x) == {Rational(-1, 2): 2} + assert roots((2*x + 1)**5, x) == {Rational(-1, 2): 5} + assert roots((2*x + 1)**10, x) == {Rational(-1, 2): 10} + + assert roots(x**4 - 1, x) == {I: 1, S.One: 1, -S.One: 1, -I: 1} + assert roots((x**4 - 1)**2, x) == {I: 2, S.One: 2, -S.One: 2, -I: 2} + + assert roots(((2*x - 3)**2).expand(), x) == {Rational( 3, 2): 2} + assert roots(((2*x + 3)**2).expand(), x) == {Rational(-3, 2): 2} + + assert roots(((2*x - 3)**3).expand(), x) == {Rational( 3, 2): 3} + assert roots(((2*x + 3)**3).expand(), x) == {Rational(-3, 2): 3} + + assert roots(((2*x - 3)**5).expand(), x) == {Rational( 3, 2): 5} + assert roots(((2*x + 3)**5).expand(), x) == {Rational(-3, 2): 5} + + assert roots(((a*x - b)**5).expand(), x) == { b/a: 5} + assert roots(((a*x + b)**5).expand(), x) == {-b/a: 5} + + assert roots(x**2 + (-a - 1)*x + a, x) == {a: 1, S.One: 1} + + assert roots(x**4 - 2*x**2 + 1, x) == {S.One: 2, S.NegativeOne: 2} + + assert roots(x**6 - 4*x**4 + 4*x**3 - x**2, x) == \ + {S.One: 2, -1 - sqrt(2): 1, S.Zero: 2, -1 + sqrt(2): 1} + + assert roots(x**8 - 1, x) == { + sqrt(2)/2 + I*sqrt(2)/2: 1, + sqrt(2)/2 - I*sqrt(2)/2: 1, + -sqrt(2)/2 + I*sqrt(2)/2: 1, + -sqrt(2)/2 - I*sqrt(2)/2: 1, + S.One: 1, -S.One: 1, I: 1, -I: 1 + } + + f = -2016*x**2 - 5616*x**3 - 2056*x**4 + 3324*x**5 + 2176*x**6 - \ + 224*x**7 - 384*x**8 - 64*x**9 + + assert roots(f) == {S.Zero: 2, -S(2): 2, S(2): 1, Rational(-7, 2): 1, + Rational(-3, 2): 1, Rational(-1, 2): 1, Rational(3, 2): 1} + + assert roots((a + b + c)*x - (a + b + c + d), x) == {(a + b + c + d)/(a + b + c): 1} + + assert roots(x**3 + x**2 - x + 1, x, cubics=False) == {} + assert roots(((x - 2)*( + x + 3)*(x - 4)).expand(), x, cubics=False) == {-S(3): 1, S(2): 1, S(4): 1} + assert roots(((x - 2)*(x + 3)*(x - 4)*(x - 5)).expand(), x, cubics=False) == \ + {-S(3): 1, S(2): 1, S(4): 1, S(5): 1} + assert roots(x**3 + 2*x**2 + 4*x + 8, x) == {-S(2): 1, -2*I: 1, 2*I: 1} + assert roots(x**3 + 2*x**2 + 4*x + 8, x, cubics=True) == \ + {-2*I: 1, 2*I: 1, -S(2): 1} + assert roots((x**2 - x)*(x**3 + 2*x**2 + 4*x + 8), x ) == \ + {S.One: 1, S.Zero: 1, -S(2): 1, -2*I: 1, 2*I: 1} + + r1_2, r1_3 = S.Half, Rational(1, 3) + + x0 = (3*sqrt(33) + 19)**r1_3 + x1 = 4/x0/3 + x2 = x0/3 + x3 = sqrt(3)*I/2 + x4 = x3 - r1_2 + x5 = -x3 - r1_2 + assert roots(x**3 + x**2 - x + 1, x, cubics=True) == { + -x1 - x2 - r1_3: 1, + -x1/x4 - x2*x4 - r1_3: 1, + -x1/x5 - x2*x5 - r1_3: 1, + } + + f = (x**2 + 2*x + 3).subs(x, 2*x**2 + 3*x).subs(x, 5*x - 4) + + r13_20, r1_20 = [ Rational(*r) + for r in ((13, 20), (1, 20)) ] + + s2 = sqrt(2) + assert roots(f, x) == { + r13_20 + r1_20*sqrt(1 - 8*I*s2): 1, + r13_20 - r1_20*sqrt(1 - 8*I*s2): 1, + r13_20 + r1_20*sqrt(1 + 8*I*s2): 1, + r13_20 - r1_20*sqrt(1 + 8*I*s2): 1, + } + + f = x**4 + x**3 + x**2 + x + 1 + + r1_4, r1_8, r5_8 = [ Rational(*r) for r in ((1, 4), (1, 8), (5, 8)) ] + + assert roots(f, x) == { + -r1_4 + r1_4*5**r1_2 + I*(r5_8 + r1_8*5**r1_2)**r1_2: 1, + -r1_4 + r1_4*5**r1_2 - I*(r5_8 + r1_8*5**r1_2)**r1_2: 1, + -r1_4 - r1_4*5**r1_2 + I*(r5_8 - r1_8*5**r1_2)**r1_2: 1, + -r1_4 - r1_4*5**r1_2 - I*(r5_8 - r1_8*5**r1_2)**r1_2: 1, + } + + f = z**3 + (-2 - y)*z**2 + (1 + 2*y - 2*x**2)*z - y + 2*x**2 + + assert roots(f, z) == { + S.One: 1, + S.Half + S.Half*y + S.Half*sqrt(1 - 2*y + y**2 + 8*x**2): 1, + S.Half + S.Half*y - S.Half*sqrt(1 - 2*y + y**2 + 8*x**2): 1, + } + + assert roots(a*b*c*x**3 + 2*x**2 + 4*x + 8, x, cubics=False) == {} + assert roots(a*b*c*x**3 + 2*x**2 + 4*x + 8, x, cubics=True) != {} + + assert roots(x**4 - 1, x, filter='Z') == {S.One: 1, -S.One: 1} + assert roots(x**4 - 1, x, filter='I') == {I: 1, -I: 1} + + assert roots((x - 1)*(x + 1), x) == {S.One: 1, -S.One: 1} + assert roots( + (x - 1)*(x + 1), x, predicate=lambda r: r.is_positive) == {S.One: 1} + + assert roots(x**4 - 1, x, filter='Z', multiple=True) == [-S.One, S.One] + assert roots(x**4 - 1, x, filter='I', multiple=True) == [I, -I] + + ar, br = symbols('a, b', real=True) + p = x**2*(ar-br)**2 + 2*x*(br-ar) + 1 + assert roots(p, x, filter='R') == {1/(ar - br): 2} + + assert roots(x**3, x, multiple=True) == [S.Zero, S.Zero, S.Zero] + assert roots(1234, x, multiple=True) == [] + + f = x**6 - x**5 + x**4 - x**3 + x**2 - x + 1 + + assert roots(f) == { + -I*sin(pi/7) + cos(pi/7): 1, + -I*sin(pi*Rational(2, 7)) - cos(pi*Rational(2, 7)): 1, + -I*sin(pi*Rational(3, 7)) + cos(pi*Rational(3, 7)): 1, + I*sin(pi/7) + cos(pi/7): 1, + I*sin(pi*Rational(2, 7)) - cos(pi*Rational(2, 7)): 1, + I*sin(pi*Rational(3, 7)) + cos(pi*Rational(3, 7)): 1, + } + + g = ((x**2 + 1)*f**2).expand() + + assert roots(g) == { + -I*sin(pi/7) + cos(pi/7): 2, + -I*sin(pi*Rational(2, 7)) - cos(pi*Rational(2, 7)): 2, + -I*sin(pi*Rational(3, 7)) + cos(pi*Rational(3, 7)): 2, + I*sin(pi/7) + cos(pi/7): 2, + I*sin(pi*Rational(2, 7)) - cos(pi*Rational(2, 7)): 2, + I*sin(pi*Rational(3, 7)) + cos(pi*Rational(3, 7)): 2, + -I: 1, I: 1, + } + + r = roots(x**3 + 40*x + 64) + real_root = [rx for rx in r if rx.is_real][0] + cr = 108 + 6*sqrt(1074) + assert real_root == -2*root(cr, 3)/3 + 20/root(cr, 3) + + eq = Poly((7 + 5*sqrt(2))*x**3 + (-6 - 4*sqrt(2))*x**2 + (-sqrt(2) - 1)*x + 2, x, domain='EX') + assert roots(eq) == {-1 + sqrt(2): 1, -2 + 2*sqrt(2): 1, -sqrt(2) + 1: 1} + + eq = Poly(41*x**5 + 29*sqrt(2)*x**5 - 153*x**4 - 108*sqrt(2)*x**4 + + 175*x**3 + 125*sqrt(2)*x**3 - 45*x**2 - 30*sqrt(2)*x**2 - 26*sqrt(2)*x - + 26*x + 24, x, domain='EX') + assert roots(eq) == {-sqrt(2) + 1: 1, -2 + 2*sqrt(2): 1, -1 + sqrt(2): 1, + -4 + 4*sqrt(2): 1, -3 + 3*sqrt(2): 1} + + eq = Poly(x**3 - 2*x**2 + 6*sqrt(2)*x**2 - 8*sqrt(2)*x + 23*x - 14 + + 14*sqrt(2), x, domain='EX') + assert roots(eq) == {-2*sqrt(2) + 2: 1, -2*sqrt(2) + 1: 1, -2*sqrt(2) - 1: 1} + + assert roots(Poly((x + sqrt(2))**3 - 7, x, domain='EX')) == \ + {-sqrt(2) + root(7, 3)*(-S.Half - sqrt(3)*I/2): 1, + -sqrt(2) + root(7, 3)*(-S.Half + sqrt(3)*I/2): 1, + -sqrt(2) + root(7, 3): 1} + +def test_roots_slow(): + """Just test that calculating these roots does not hang. """ + a, b, c, d, x = symbols("a,b,c,d,x") + + f1 = x**2*c + (a/b) + x*c*d - a + f2 = x**2*(a + b*(c - d)*a) + x*a*b*c/(b*d - d) + (a*d - c/d) + + assert list(roots(f1, x).values()) == [1, 1] + assert list(roots(f2, x).values()) == [1, 1] + + (zz, yy, xx, zy, zx, yx, k) = symbols("zz,yy,xx,zy,zx,yx,k") + + e1 = (zz - k)*(yy - k)*(xx - k) + zy*yx*zx + zx - zy - yx + e2 = (zz - k)*yx*yx + zx*(yy - k)*zx + zy*zy*(xx - k) + + assert list(roots(e1 - e2, k).values()) == [1, 1, 1] + + f = x**3 + 2*x**2 + 8 + R = list(roots(f).keys()) + + assert not any(i for i in [f.subs(x, ri).n(chop=True) for ri in R]) + + +def test_roots_inexact(): + R1 = roots(x**2 + x + 1, x, multiple=True) + R2 = roots(x**2 + x + 1.0, x, multiple=True) + + for r1, r2 in zip(R1, R2): + assert abs(r1 - r2) < 1e-12 + + f = x**4 + 3.0*sqrt(2.0)*x**3 - (78.0 + 24.0*sqrt(3.0))*x**2 \ + + 144.0*(2*sqrt(3.0) + 9.0) + + R1 = roots(f, multiple=True) + R2 = (-12.7530479110482, -3.85012393732929, + 4.89897948556636, 7.46155167569183) + + for r1, r2 in zip(R1, R2): + assert abs(r1 - r2) < 1e-10 + + +def test_roots_preprocessed(): + E, F, J, L = symbols("E,F,J,L") + + f = -21601054687500000000*E**8*J**8/L**16 + \ + 508232812500000000*F*x*E**7*J**7/L**14 - \ + 4269543750000000*E**6*F**2*J**6*x**2/L**12 + \ + 16194716250000*E**5*F**3*J**5*x**3/L**10 - \ + 27633173750*E**4*F**4*J**4*x**4/L**8 + \ + 14840215*E**3*F**5*J**3*x**5/L**6 + \ + 54794*E**2*F**6*J**2*x**6/(5*L**4) - \ + 1153*E*J*F**7*x**7/(80*L**2) + \ + 633*F**8*x**8/160000 + + assert roots(f, x) == {} + + R1 = roots(f.evalf(), x, multiple=True) + R2 = [-1304.88375606366, 97.1168816800648, 186.946430171876, 245.526792947065, + 503.441004174773, 791.549343830097, 1273.16678129348, 1850.10650616851] + + w = Wild('w') + p = w*E*J/(F*L**2) + + assert len(R1) == len(R2) + + for r1, r2 in zip(R1, R2): + match = r1.match(p) + assert match is not None and abs(match[w] - r2) < 1e-10 + + +def test_roots_strict(): + assert roots(x**2 - 2*x + 1, strict=False) == {1: 2} + assert roots(x**2 - 2*x + 1, strict=True) == {1: 2} + + assert roots(x**6 - 2*x**5 - x**2 + 3*x - 2, strict=False) == {2: 1} + raises(UnsolvableFactorError, lambda: roots(x**6 - 2*x**5 - x**2 + 3*x - 2, strict=True)) + + +def test_roots_mixed(): + f = -1936 - 5056*x - 7592*x**2 + 2704*x**3 - 49*x**4 + + _re, _im = intervals(f, all=True) + _nroots = nroots(f) + _sroots = roots(f, multiple=True) + + _re = [ Interval(a, b) for (a, b), _ in _re ] + _im = [ Interval(re(a), re(b))*Interval(im(a), im(b)) for (a, b), + _ in _im ] + + _intervals = _re + _im + _sroots = [ r.evalf() for r in _sroots ] + + _nroots = sorted(_nroots, key=lambda x: x.sort_key()) + _sroots = sorted(_sroots, key=lambda x: x.sort_key()) + + for _roots in (_nroots, _sroots): + for i, r in zip(_intervals, _roots): + if r.is_real: + assert r in i + else: + assert (re(r), im(r)) in i + + +def test_root_factors(): + assert root_factors(Poly(1, x)) == [Poly(1, x)] + assert root_factors(Poly(x, x)) == [Poly(x, x)] + + assert root_factors(x**2 - 1, x) == [x + 1, x - 1] + assert root_factors(x**2 - y, x) == [x - sqrt(y), x + sqrt(y)] + + assert root_factors((x**4 - 1)**2) == \ + [x + 1, x + 1, x - 1, x - 1, x - I, x - I, x + I, x + I] + + assert root_factors(Poly(x**4 - 1, x), filter='Z') == \ + [Poly(x + 1, x), Poly(x - 1, x), Poly(x**2 + 1, x)] + assert root_factors(8*x**2 + 12*x**4 + 6*x**6 + x**8, x, filter='Q') == \ + [x, x, x**6 + 6*x**4 + 12*x**2 + 8] + + +@slow +def test_nroots1(): + n = 64 + p = legendre_poly(n, x, polys=True) + + raises(mpmath.mp.NoConvergence, lambda: p.nroots(n=3, maxsteps=5)) + + roots = p.nroots(n=3) + # The order of roots matters. They are ordered from smallest to the + # largest. + assert [str(r) for r in roots] == \ + ['-0.999', '-0.996', '-0.991', '-0.983', '-0.973', '-0.961', + '-0.946', '-0.930', '-0.911', '-0.889', '-0.866', '-0.841', + '-0.813', '-0.784', '-0.753', '-0.720', '-0.685', '-0.649', + '-0.611', '-0.572', '-0.531', '-0.489', '-0.446', '-0.402', + '-0.357', '-0.311', '-0.265', '-0.217', '-0.170', '-0.121', + '-0.0730', '-0.0243', '0.0243', '0.0730', '0.121', '0.170', + '0.217', '0.265', '0.311', '0.357', '0.402', '0.446', '0.489', + '0.531', '0.572', '0.611', '0.649', '0.685', '0.720', '0.753', + '0.784', '0.813', '0.841', '0.866', '0.889', '0.911', '0.930', + '0.946', '0.961', '0.973', '0.983', '0.991', '0.996', '0.999'] + +def test_nroots2(): + p = Poly(x**5 + 3*x + 1, x) + + roots = p.nroots(n=3) + # The order of roots matters. The roots are ordered by their real + # components (if they agree, then by their imaginary components), + # with real roots appearing first. + assert [str(r) for r in roots] == \ + ['-0.332', '-0.839 - 0.944*I', '-0.839 + 0.944*I', + '1.01 - 0.937*I', '1.01 + 0.937*I'] + + roots = p.nroots(n=5) + assert [str(r) for r in roots] == \ + ['-0.33199', '-0.83907 - 0.94385*I', '-0.83907 + 0.94385*I', + '1.0051 - 0.93726*I', '1.0051 + 0.93726*I'] + + +def test_roots_composite(): + assert len(roots(Poly(y**3 + y**2*sqrt(x) + y + x, y, composite=True))) == 3 + + +def test_issue_19113(): + eq = cos(x)**3 - cos(x) + 1 + raises(PolynomialError, lambda: roots(eq)) + + +def test_issue_17454(): + assert roots([1, -3*(-4 - 4*I)**2/8 + 12*I, 0], multiple=True) == [0, 0] + + +def test_issue_20913(): + assert Poly(x + 9671406556917067856609794, x).real_roots() == [-9671406556917067856609794] + assert Poly(x**3 + 4, x).real_roots() == [-2**(S(2)/3)] + + +def test_issue_22768(): + e = Rational(1, 3) + r = (-1/a)**e*(a + 1)**(5*e) + assert roots(Poly(a*x**3 + (a + 1)**5, x)) == { + r: 1, + -r*(1 + sqrt(3)*I)/2: 1, + r*(-1 + sqrt(3)*I)/2: 1} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polytools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polytools.py new file mode 100644 index 0000000000000000000000000000000000000000..a4096447cecea9db6e7559c305af6312b2a72725 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polytools.py @@ -0,0 +1,3976 @@ +"""Tests for user-friendly public interface to polynomial functions. """ + +import pickle + +from sympy.polys.polytools import ( + Poly, PurePoly, poly, + parallel_poly_from_expr, + degree, degree_list, + total_degree, + LC, LM, LT, + pdiv, prem, pquo, pexquo, + div, rem, quo, exquo, + half_gcdex, gcdex, invert, + subresultants, + resultant, discriminant, + terms_gcd, cofactors, + gcd, gcd_list, + lcm, lcm_list, + trunc, + monic, content, primitive, + compose, decompose, + sturm, + gff_list, gff, + sqf_norm, sqf_part, sqf_list, sqf, + factor_list, factor, + intervals, refine_root, count_roots, + all_roots, real_roots, nroots, ground_roots, + nth_power_roots_poly, + cancel, reduced, groebner, + GroebnerBasis, is_zero_dimensional, + _torational_factor_list, + to_rational_coeffs) + +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + ExactQuotientFailed, + PolificationFailed, + ComputationFailed, + UnificationFailed, + RefinementFailed, + GeneratorsNeeded, + GeneratorsError, + PolynomialError, + CoercionFailed, + DomainError, + OptionError, + FlagError) + +from sympy.polys.polyclasses import DMP + +from sympy.polys.fields import field +from sympy.polys.domains import FF, ZZ, QQ, ZZ_I, QQ_I, RR, EX +from sympy.polys.domains.realfield import RealField +from sympy.polys.domains.complexfield import ComplexField +from sympy.polys.orderings import lex, grlex, grevlex + +from sympy.combinatorics.galois import S4TransitiveSubgroups +from sympy.core.add import Add +from sympy.core.basic import _aresame +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.function import (Derivative, diff, expand) +from sympy.core.mul import _keep_coeff, Mul +from sympy.core.numbers import (Float, I, Integer, Rational, oo, pi) +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.hyperbolic import tanh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.polys.rootoftools import rootof +from sympy.simplify.simplify import signsimp +from sympy.utilities.iterables import iterable +from sympy.utilities.exceptions import SymPyDeprecationWarning + +from sympy.testing.pytest import ( + raises, warns_deprecated_sympy, warns, tooslow, XFAIL +) + +from sympy.abc import a, b, c, d, p, q, t, w, x, y, z + + +def _epsilon_eq(a, b): + for u, v in zip(a, b): + if abs(u - v) > 1e-10: + return False + return True + + +def _strict_eq(a, b): + if type(a) == type(b): + if iterable(a): + if len(a) == len(b): + return all(_strict_eq(c, d) for c, d in zip(a, b)) + else: + return False + else: + return isinstance(a, Poly) and a.eq(b, strict=True) + else: + return False + + +def test_Poly_mixed_operations(): + p = Poly(x, x) + with warns_deprecated_sympy(): + p * exp(x) + with warns_deprecated_sympy(): + p + exp(x) + with warns_deprecated_sympy(): + p - exp(x) + + +def test_Poly_from_dict(): + K = FF(3) + + assert Poly.from_dict( + {0: 1, 1: 2}, gens=x, domain=K).rep == DMP([K(2), K(1)], K) + assert Poly.from_dict( + {0: 1, 1: 5}, gens=x, domain=K).rep == DMP([K(2), K(1)], K) + + assert Poly.from_dict( + {(0,): 1, (1,): 2}, gens=x, domain=K).rep == DMP([K(2), K(1)], K) + assert Poly.from_dict( + {(0,): 1, (1,): 5}, gens=x, domain=K).rep == DMP([K(2), K(1)], K) + + assert Poly.from_dict({(0, 0): 1, (1, 1): 2}, gens=( + x, y), domain=K).rep == DMP([[K(2), K(0)], [K(1)]], K) + + assert Poly.from_dict({0: 1, 1: 2}, gens=x).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_dict( + {0: 1, 1: 2}, gens=x, field=True).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_dict( + {0: 1, 1: 2}, gens=x, domain=ZZ).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_dict( + {0: 1, 1: 2}, gens=x, domain=QQ).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_dict( + {(0,): 1, (1,): 2}, gens=x).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_dict( + {(0,): 1, (1,): 2}, gens=x, field=True).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_dict( + {(0,): 1, (1,): 2}, gens=x, domain=ZZ).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_dict( + {(0,): 1, (1,): 2}, gens=x, domain=QQ).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_dict({(1,): sin(y)}, gens=x, composite=False) == \ + Poly(sin(y)*x, x, domain='EX') + assert Poly.from_dict({(1,): y}, gens=x, composite=False) == \ + Poly(y*x, x, domain='EX') + assert Poly.from_dict({(1, 1): 1}, gens=(x, y), composite=False) == \ + Poly(x*y, x, y, domain='ZZ') + assert Poly.from_dict({(1, 0): y}, gens=(x, z), composite=False) == \ + Poly(y*x, x, z, domain='EX') + + +def test_Poly_from_list(): + K = FF(3) + + assert Poly.from_list([2, 1], gens=x, domain=K).rep == DMP([K(2), K(1)], K) + assert Poly.from_list([5, 1], gens=x, domain=K).rep == DMP([K(2), K(1)], K) + + assert Poly.from_list([2, 1], gens=x).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_list([2, 1], gens=x, field=True).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_list([2, 1], gens=x, domain=ZZ).rep == DMP([ZZ(2), ZZ(1)], ZZ) + assert Poly.from_list([2, 1], gens=x, domain=QQ).rep == DMP([QQ(2), QQ(1)], QQ) + + assert Poly.from_list([0, 1.0], gens=x).rep == DMP([RR(1.0)], RR) + assert Poly.from_list([1.0, 0], gens=x).rep == DMP([RR(1.0), RR(0.0)], RR) + + raises(MultivariatePolynomialError, lambda: Poly.from_list([[]], gens=(x, y))) + + +def test_Poly_from_poly(): + f = Poly(x + 7, x, domain=ZZ) + g = Poly(x + 2, x, modulus=3) + h = Poly(x + y, x, y, domain=ZZ) + + K = FF(3) + + assert Poly.from_poly(f) == f + assert Poly.from_poly(f, domain=K).rep == DMP([K(1), K(1)], K) + assert Poly.from_poly(f, domain=ZZ).rep == DMP([ZZ(1), ZZ(7)], ZZ) + assert Poly.from_poly(f, domain=QQ).rep == DMP([QQ(1), QQ(7)], QQ) + + assert Poly.from_poly(f, gens=x) == f + assert Poly.from_poly(f, gens=x, domain=K).rep == DMP([K(1), K(1)], K) + assert Poly.from_poly(f, gens=x, domain=ZZ).rep == DMP([ZZ(1), ZZ(7)], ZZ) + assert Poly.from_poly(f, gens=x, domain=QQ).rep == DMP([QQ(1), QQ(7)], QQ) + + assert Poly.from_poly(f, gens=y) == Poly(x + 7, y, domain='ZZ[x]') + raises(CoercionFailed, lambda: Poly.from_poly(f, gens=y, domain=K)) + raises(CoercionFailed, lambda: Poly.from_poly(f, gens=y, domain=ZZ)) + raises(CoercionFailed, lambda: Poly.from_poly(f, gens=y, domain=QQ)) + + assert Poly.from_poly(f, gens=(x, y)) == Poly(x + 7, x, y, domain='ZZ') + assert Poly.from_poly( + f, gens=(x, y), domain=ZZ) == Poly(x + 7, x, y, domain='ZZ') + assert Poly.from_poly( + f, gens=(x, y), domain=QQ) == Poly(x + 7, x, y, domain='QQ') + assert Poly.from_poly( + f, gens=(x, y), modulus=3) == Poly(x + 7, x, y, domain='FF(3)') + + K = FF(2) + + assert Poly.from_poly(g) == g + assert Poly.from_poly(g, domain=ZZ).rep == DMP([ZZ(1), ZZ(-1)], ZZ) + raises(CoercionFailed, lambda: Poly.from_poly(g, domain=QQ)) + assert Poly.from_poly(g, domain=K).rep == DMP([K(1), K(0)], K) + + assert Poly.from_poly(g, gens=x) == g + assert Poly.from_poly(g, gens=x, domain=ZZ).rep == DMP([ZZ(1), ZZ(-1)], ZZ) + raises(CoercionFailed, lambda: Poly.from_poly(g, gens=x, domain=QQ)) + assert Poly.from_poly(g, gens=x, domain=K).rep == DMP([K(1), K(0)], K) + + K = FF(3) + + assert Poly.from_poly(h) == h + assert Poly.from_poly( + h, domain=ZZ).rep == DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + assert Poly.from_poly( + h, domain=QQ).rep == DMP([[QQ(1)], [QQ(1), QQ(0)]], QQ) + assert Poly.from_poly(h, domain=K).rep == DMP([[K(1)], [K(1), K(0)]], K) + + assert Poly.from_poly(h, gens=x) == Poly(x + y, x, domain=ZZ[y]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=x, domain=ZZ)) + assert Poly.from_poly( + h, gens=x, domain=ZZ[y]) == Poly(x + y, x, domain=ZZ[y]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=x, domain=QQ)) + assert Poly.from_poly( + h, gens=x, domain=QQ[y]) == Poly(x + y, x, domain=QQ[y]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=x, modulus=3)) + + assert Poly.from_poly(h, gens=y) == Poly(x + y, y, domain=ZZ[x]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=y, domain=ZZ)) + assert Poly.from_poly( + h, gens=y, domain=ZZ[x]) == Poly(x + y, y, domain=ZZ[x]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=y, domain=QQ)) + assert Poly.from_poly( + h, gens=y, domain=QQ[x]) == Poly(x + y, y, domain=QQ[x]) + raises(CoercionFailed, lambda: Poly.from_poly(h, gens=y, modulus=3)) + + assert Poly.from_poly(h, gens=(x, y)) == h + assert Poly.from_poly( + h, gens=(x, y), domain=ZZ).rep == DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + assert Poly.from_poly( + h, gens=(x, y), domain=QQ).rep == DMP([[QQ(1)], [QQ(1), QQ(0)]], QQ) + assert Poly.from_poly( + h, gens=(x, y), domain=K).rep == DMP([[K(1)], [K(1), K(0)]], K) + + assert Poly.from_poly( + h, gens=(y, x)).rep == DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + assert Poly.from_poly( + h, gens=(y, x), domain=ZZ).rep == DMP([[ZZ(1)], [ZZ(1), ZZ(0)]], ZZ) + assert Poly.from_poly( + h, gens=(y, x), domain=QQ).rep == DMP([[QQ(1)], [QQ(1), QQ(0)]], QQ) + assert Poly.from_poly( + h, gens=(y, x), domain=K).rep == DMP([[K(1)], [K(1), K(0)]], K) + + assert Poly.from_poly( + h, gens=(x, y), field=True).rep == DMP([[QQ(1)], [QQ(1), QQ(0)]], QQ) + assert Poly.from_poly( + h, gens=(x, y), field=True).rep == DMP([[QQ(1)], [QQ(1), QQ(0)]], QQ) + + +def test_Poly_from_expr(): + raises(GeneratorsNeeded, lambda: Poly.from_expr(S.Zero)) + raises(GeneratorsNeeded, lambda: Poly.from_expr(S(7))) + + F3 = FF(3) + + assert Poly.from_expr(x + 5, domain=F3).rep == DMP([F3(1), F3(2)], F3) + assert Poly.from_expr(y + 5, domain=F3).rep == DMP([F3(1), F3(2)], F3) + + assert Poly.from_expr(x + 5, x, domain=F3).rep == DMP([F3(1), F3(2)], F3) + assert Poly.from_expr(y + 5, y, domain=F3).rep == DMP([F3(1), F3(2)], F3) + + assert Poly.from_expr(x + y, domain=F3).rep == DMP([[F3(1)], [F3(1), F3(0)]], F3) + assert Poly.from_expr(x + y, x, y, domain=F3).rep == DMP([[F3(1)], [F3(1), F3(0)]], F3) + + assert Poly.from_expr(x + 5).rep == DMP([ZZ(1), ZZ(5)], ZZ) + assert Poly.from_expr(y + 5).rep == DMP([ZZ(1), ZZ(5)], ZZ) + + assert Poly.from_expr(x + 5, x).rep == DMP([ZZ(1), ZZ(5)], ZZ) + assert Poly.from_expr(y + 5, y).rep == DMP([ZZ(1), ZZ(5)], ZZ) + + assert Poly.from_expr(x + 5, domain=ZZ).rep == DMP([ZZ(1), ZZ(5)], ZZ) + assert Poly.from_expr(y + 5, domain=ZZ).rep == DMP([ZZ(1), ZZ(5)], ZZ) + + assert Poly.from_expr(x + 5, x, domain=ZZ).rep == DMP([ZZ(1), ZZ(5)], ZZ) + assert Poly.from_expr(y + 5, y, domain=ZZ).rep == DMP([ZZ(1), ZZ(5)], ZZ) + + assert Poly.from_expr(x + 5, x, y, domain=ZZ).rep == DMP([[ZZ(1)], [ZZ(5)]], ZZ) + assert Poly.from_expr(y + 5, x, y, domain=ZZ).rep == DMP([[ZZ(1), ZZ(5)]], ZZ) + + +def test_Poly_rootof_extension(): + r1 = rootof(x**3 + x + 3, 0) + r2 = rootof(x**3 + x + 3, 1) + K1 = QQ.algebraic_field(r1) + K2 = QQ.algebraic_field(r2) + assert Poly(r1, y) == Poly(r1, y, domain=EX) + assert Poly(r2, y) == Poly(r2, y, domain=EX) + assert Poly(r1, y, extension=True) == Poly(r1, y, domain=K1) + assert Poly(r2, y, extension=True) == Poly(r2, y, domain=K2) + + +@tooslow +def test_Poly_rootof_extension_primitive_element(): + r1 = rootof(x**3 + x + 3, 0) + r2 = rootof(x**3 + x + 3, 1) + K12 = QQ.algebraic_field(r1 + r2) + assert Poly(r1*y + r2, y, extension=True) == Poly(r1*y + r2, y, domain=K12) + + +@XFAIL +def test_Poly_rootof_same_symbol_issue_26808(): + # XXX: This fails because r1 contains x. + r1 = rootof(x**3 + x + 3, 0) + K1 = QQ.algebraic_field(r1) + assert Poly(r1, x) == Poly(r1, x, domain=EX) + assert Poly(r1, x, extension=True) == Poly(r1, x, domain=K1) + + +def test_Poly_rootof_extension_to_sympy(): + # Verify that when primitive elements and RootOf are used, the expression + # is not exploded on the way back to sympy. + r1 = rootof(y**3 + y**2 - 1, 0) + r2 = rootof(z**5 + z**2 - 1, 0) + p = -x**5 + x**2 + x*r1 - r2 + 3*r1**2 + assert p.as_poly(x, extension=True).as_expr() == p + + +def test_poly_from_domain_element(): + dom = ZZ[x] + assert Poly(dom(x+1), y, domain=dom).rep == DMP([dom(x+1)], dom) + dom = dom.get_field() + assert Poly(dom(x+1), y, domain=dom).rep == DMP([dom(x+1)], dom) + + dom = QQ[x] + assert Poly(dom(x+1), y, domain=dom).rep == DMP([dom(x+1)], dom) + dom = dom.get_field() + assert Poly(dom(x+1), y, domain=dom).rep == DMP([dom(x+1)], dom) + + dom = ZZ.old_poly_ring(x) + assert Poly(dom([ZZ(1), ZZ(1)]), y, domain=dom).rep == DMP([dom([ZZ(1), ZZ(1)])], dom) + dom = dom.get_field() + assert Poly(dom([ZZ(1), ZZ(1)]), y, domain=dom).rep == DMP([dom([ZZ(1), ZZ(1)])], dom) + + dom = QQ.old_poly_ring(x) + assert Poly(dom([QQ(1), QQ(1)]), y, domain=dom).rep == DMP([dom([QQ(1), QQ(1)])], dom) + dom = dom.get_field() + assert Poly(dom([QQ(1), QQ(1)]), y, domain=dom).rep == DMP([dom([QQ(1), QQ(1)])], dom) + + dom = QQ.algebraic_field(I) + assert Poly(dom([1, 1]), x, domain=dom).rep == DMP([dom([1, 1])], dom) + + +def test_Poly__new__(): + raises(GeneratorsError, lambda: Poly(x + 1, x, x)) + + raises(GeneratorsError, lambda: Poly(x + y, x, y, domain=ZZ[x])) + raises(GeneratorsError, lambda: Poly(x + y, x, y, domain=ZZ[y])) + + raises(OptionError, lambda: Poly(x, x, symmetric=True)) + raises(OptionError, lambda: Poly(x + 2, x, modulus=3, domain=QQ)) + + raises(OptionError, lambda: Poly(x + 2, x, domain=ZZ, gaussian=True)) + raises(OptionError, lambda: Poly(x + 2, x, modulus=3, gaussian=True)) + + raises(OptionError, lambda: Poly(x + 2, x, domain=ZZ, extension=[sqrt(3)])) + raises(OptionError, lambda: Poly(x + 2, x, modulus=3, extension=[sqrt(3)])) + + raises(OptionError, lambda: Poly(x + 2, x, domain=ZZ, extension=True)) + raises(OptionError, lambda: Poly(x + 2, x, modulus=3, extension=True)) + + raises(OptionError, lambda: Poly(x + 2, x, domain=ZZ, greedy=True)) + raises(OptionError, lambda: Poly(x + 2, x, domain=QQ, field=True)) + + raises(OptionError, lambda: Poly(x + 2, x, domain=ZZ, greedy=False)) + raises(OptionError, lambda: Poly(x + 2, x, domain=QQ, field=False)) + + raises(NotImplementedError, lambda: Poly(x + 1, x, modulus=3, order='grlex')) + raises(NotImplementedError, lambda: Poly(x + 1, x, order='grlex')) + + raises(GeneratorsNeeded, lambda: Poly({1: 2, 0: 1})) + raises(GeneratorsNeeded, lambda: Poly([2, 1])) + raises(GeneratorsNeeded, lambda: Poly((2, 1))) + + raises(GeneratorsNeeded, lambda: Poly(1)) + + assert Poly('x-x') == Poly(0, x) + + f = a*x**2 + b*x + c + + assert Poly({2: a, 1: b, 0: c}, x) == f + assert Poly(iter([a, b, c]), x) == f + assert Poly([a, b, c], x) == f + assert Poly((a, b, c), x) == f + + f = Poly({}, x, y, z) + + assert f.gens == (x, y, z) and f.as_expr() == 0 + + assert Poly(Poly(a*x + b*y, x, y), x) == Poly(a*x + b*y, x) + + assert Poly(3*x**2 + 2*x + 1, domain='ZZ').all_coeffs() == [3, 2, 1] + assert Poly(3*x**2 + 2*x + 1, domain='QQ').all_coeffs() == [3, 2, 1] + assert Poly(3*x**2 + 2*x + 1, domain='RR').all_coeffs() == [3.0, 2.0, 1.0] + + raises(CoercionFailed, lambda: Poly(3*x**2/5 + x*Rational(2, 5) + 1, domain='ZZ')) + assert Poly( + 3*x**2/5 + x*Rational(2, 5) + 1, domain='QQ').all_coeffs() == [Rational(3, 5), Rational(2, 5), 1] + assert _epsilon_eq( + Poly(3*x**2/5 + x*Rational(2, 5) + 1, domain='RR').all_coeffs(), [0.6, 0.4, 1.0]) + + assert Poly(3.0*x**2 + 2.0*x + 1, domain='ZZ').all_coeffs() == [3, 2, 1] + assert Poly(3.0*x**2 + 2.0*x + 1, domain='QQ').all_coeffs() == [3, 2, 1] + assert Poly( + 3.0*x**2 + 2.0*x + 1, domain='RR').all_coeffs() == [3.0, 2.0, 1.0] + + raises(CoercionFailed, lambda: Poly(3.1*x**2 + 2.1*x + 1, domain='ZZ')) + assert Poly(3.1*x**2 + 2.1*x + 1, domain='QQ').all_coeffs() == [Rational(31, 10), Rational(21, 10), 1] + assert Poly(3.1*x**2 + 2.1*x + 1, domain='RR').all_coeffs() == [3.1, 2.1, 1.0] + + assert Poly({(2, 1): 1, (1, 2): 2, (1, 1): 3}, x, y) == \ + Poly(x**2*y + 2*x*y**2 + 3*x*y, x, y) + + assert Poly(x**2 + 1, extension=I).get_domain() == QQ.algebraic_field(I) + + f = 3*x**5 - x**4 + x**3 - x** 2 + 65538 + + assert Poly(f, x, modulus=65537, symmetric=True) == \ + Poly(3*x**5 - x**4 + x**3 - x** 2 + 1, x, modulus=65537, + symmetric=True) + assert Poly(f, x, modulus=65537, symmetric=False) == \ + Poly(3*x**5 + 65536*x**4 + x**3 + 65536*x** 2 + 1, x, + modulus=65537, symmetric=False) + + N = 10**100 + assert Poly(-1, x, modulus=N, symmetric=False).as_expr() == N - 1 + + assert isinstance(Poly(x**2 + x + 1.0).get_domain(), RealField) + assert isinstance(Poly(x**2 + x + I + 1.0).get_domain(), ComplexField) + + +def test_Poly__args(): + assert Poly(x**2 + 1).args == (x**2 + 1, x) + + +def test_Poly__gens(): + assert Poly((x - p)*(x - q), x).gens == (x,) + assert Poly((x - p)*(x - q), p).gens == (p,) + assert Poly((x - p)*(x - q), q).gens == (q,) + + assert Poly((x - p)*(x - q), x, p).gens == (x, p) + assert Poly((x - p)*(x - q), x, q).gens == (x, q) + + assert Poly((x - p)*(x - q), x, p, q).gens == (x, p, q) + assert Poly((x - p)*(x - q), p, x, q).gens == (p, x, q) + assert Poly((x - p)*(x - q), p, q, x).gens == (p, q, x) + + assert Poly((x - p)*(x - q)).gens == (x, p, q) + + assert Poly((x - p)*(x - q), sort='x > p > q').gens == (x, p, q) + assert Poly((x - p)*(x - q), sort='p > x > q').gens == (p, x, q) + assert Poly((x - p)*(x - q), sort='p > q > x').gens == (p, q, x) + + assert Poly((x - p)*(x - q), x, p, q, sort='p > q > x').gens == (x, p, q) + + assert Poly((x - p)*(x - q), wrt='x').gens == (x, p, q) + assert Poly((x - p)*(x - q), wrt='p').gens == (p, x, q) + assert Poly((x - p)*(x - q), wrt='q').gens == (q, x, p) + + assert Poly((x - p)*(x - q), wrt=x).gens == (x, p, q) + assert Poly((x - p)*(x - q), wrt=p).gens == (p, x, q) + assert Poly((x - p)*(x - q), wrt=q).gens == (q, x, p) + + assert Poly((x - p)*(x - q), x, p, q, wrt='p').gens == (x, p, q) + + assert Poly((x - p)*(x - q), wrt='p', sort='q > x').gens == (p, q, x) + assert Poly((x - p)*(x - q), wrt='q', sort='p > x').gens == (q, p, x) + + +def test_Poly_zero(): + assert Poly(x).zero == Poly(0, x, domain=ZZ) + assert Poly(x/2).zero == Poly(0, x, domain=QQ) + + +def test_Poly_one(): + assert Poly(x).one == Poly(1, x, domain=ZZ) + assert Poly(x/2).one == Poly(1, x, domain=QQ) + + +def test_Poly__unify(): + raises(UnificationFailed, lambda: Poly(x)._unify(y)) + + F3 = FF(3) + + assert Poly(x, x, modulus=3)._unify(Poly(y, y, modulus=3))[2:] == ( + DMP([[F3(1)], []], F3), DMP([[F3(1), F3(0)]], F3)) + raises(UnificationFailed, lambda: Poly(x, x, modulus=3)._unify(Poly(y, y, modulus=5))) + + raises(UnificationFailed, lambda: Poly(y, x, y)._unify(Poly(x, x, modulus=3))) + raises(UnificationFailed, lambda: Poly(x, x, modulus=3)._unify(Poly(y, x, y))) + + assert Poly(x + 1, x)._unify(Poly(x + 2, x))[2:] ==\ + (DMP([ZZ(1), ZZ(1)], ZZ), DMP([ZZ(1), ZZ(2)], ZZ)) + assert Poly(x + 1, x, domain='QQ')._unify(Poly(x + 2, x))[2:] ==\ + (DMP([QQ(1), QQ(1)], QQ), DMP([QQ(1), QQ(2)], QQ)) + assert Poly(x + 1, x)._unify(Poly(x + 2, x, domain='QQ'))[2:] ==\ + (DMP([QQ(1), QQ(1)], QQ), DMP([QQ(1), QQ(2)], QQ)) + + assert Poly(x + 1, x)._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[ZZ(1)], [ZZ(1)]], ZZ), DMP([[ZZ(1)], [ZZ(2)]], ZZ)) + assert Poly(x + 1, x, domain='QQ')._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + assert Poly(x + 1, x)._unify(Poly(x + 2, x, y, domain='QQ'))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + + assert Poly(x + 1, x, y)._unify(Poly(x + 2, x))[2:] ==\ + (DMP([[ZZ(1)], [ZZ(1)]], ZZ), DMP([[ZZ(1)], [ZZ(2)]], ZZ)) + assert Poly(x + 1, x, y, domain='QQ')._unify(Poly(x + 2, x))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + assert Poly(x + 1, x, y)._unify(Poly(x + 2, x, domain='QQ'))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + + assert Poly(x + 1, x, y)._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[ZZ(1)], [ZZ(1)]], ZZ), DMP([[ZZ(1)], [ZZ(2)]], ZZ)) + assert Poly(x + 1, x, y, domain='QQ')._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + assert Poly(x + 1, x, y)._unify(Poly(x + 2, x, y, domain='QQ'))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + + assert Poly(x + 1, x)._unify(Poly(x + 2, y, x))[2:] ==\ + (DMP([[ZZ(1), ZZ(1)]], ZZ), DMP([[ZZ(1), ZZ(2)]], ZZ)) + assert Poly(x + 1, x, domain='QQ')._unify(Poly(x + 2, y, x))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + assert Poly(x + 1, x)._unify(Poly(x + 2, y, x, domain='QQ'))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + + assert Poly(x + 1, y, x)._unify(Poly(x + 2, x))[2:] ==\ + (DMP([[ZZ(1), ZZ(1)]], ZZ), DMP([[ZZ(1), ZZ(2)]], ZZ)) + assert Poly(x + 1, y, x, domain='QQ')._unify(Poly(x + 2, x))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + assert Poly(x + 1, y, x)._unify(Poly(x + 2, x, domain='QQ'))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + + assert Poly(x + 1, x, y)._unify(Poly(x + 2, y, x))[2:] ==\ + (DMP([[ZZ(1)], [ZZ(1)]], ZZ), DMP([[ZZ(1)], [ZZ(2)]], ZZ)) + assert Poly(x + 1, x, y, domain='QQ')._unify(Poly(x + 2, y, x))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + assert Poly(x + 1, x, y)._unify(Poly(x + 2, y, x, domain='QQ'))[2:] ==\ + (DMP([[QQ(1)], [QQ(1)]], QQ), DMP([[QQ(1)], [QQ(2)]], QQ)) + + assert Poly(x + 1, y, x)._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[ZZ(1), ZZ(1)]], ZZ), DMP([[ZZ(1), ZZ(2)]], ZZ)) + assert Poly(x + 1, y, x, domain='QQ')._unify(Poly(x + 2, x, y))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + assert Poly(x + 1, y, x)._unify(Poly(x + 2, x, y, domain='QQ'))[2:] ==\ + (DMP([[QQ(1), QQ(1)]], QQ), DMP([[QQ(1), QQ(2)]], QQ)) + + assert Poly(x**2 + I, x, domain=ZZ_I).unify(Poly(x**2 + sqrt(2), x, extension=True)) == \ + (Poly(x**2 + I, x, domain='QQ'), Poly(x**2 + sqrt(2), x, domain='QQ')) + + F, A, B = field("a,b", ZZ) + + assert Poly(a*x, x, domain='ZZ[a]')._unify(Poly(a*b*x, x, domain='ZZ(a,b)'))[2:] == \ + (DMP([A, F(0)], F.to_domain()), DMP([A*B, F(0)], F.to_domain())) + + assert Poly(a*x, x, domain='ZZ(a)')._unify(Poly(a*b*x, x, domain='ZZ(a,b)'))[2:] == \ + (DMP([A, F(0)], F.to_domain()), DMP([A*B, F(0)], F.to_domain())) + + raises(CoercionFailed, lambda: Poly(Poly(x**2 + x**2*z, y, field=True), domain='ZZ(x)')) + + f = Poly(t**2 + t/3 + x, t, domain='QQ(x)') + g = Poly(t**2 + t/3 + x, t, domain='QQ[x]') + + assert f._unify(g)[2:] == (f.rep, f.rep) + + +def test_Poly_free_symbols(): + assert Poly(x**2 + 1).free_symbols == {x} + assert Poly(x**2 + y*z).free_symbols == {x, y, z} + assert Poly(x**2 + y*z, x).free_symbols == {x, y, z} + assert Poly(x**2 + sin(y*z)).free_symbols == {x, y, z} + assert Poly(x**2 + sin(y*z), x).free_symbols == {x, y, z} + assert Poly(x**2 + sin(y*z), x, domain=EX).free_symbols == {x, y, z} + assert Poly(1 + x + x**2, x, y, z).free_symbols == {x} + assert Poly(x + sin(y), z).free_symbols == {x, y} + + +def test_PurePoly_free_symbols(): + assert PurePoly(x**2 + 1).free_symbols == set() + assert PurePoly(x**2 + y*z).free_symbols == set() + assert PurePoly(x**2 + y*z, x).free_symbols == {y, z} + assert PurePoly(x**2 + sin(y*z)).free_symbols == set() + assert PurePoly(x**2 + sin(y*z), x).free_symbols == {y, z} + assert PurePoly(x**2 + sin(y*z), x, domain=EX).free_symbols == {y, z} + + +def test_Poly__eq__(): + assert (Poly(x, x) == Poly(x, x)) is True + assert (Poly(x, x, domain=QQ) == Poly(x, x)) is False + assert (Poly(x, x) == Poly(x, x, domain=QQ)) is False + + assert (Poly(x, x, domain=ZZ[a]) == Poly(x, x)) is False + assert (Poly(x, x) == Poly(x, x, domain=ZZ[a])) is False + + assert (Poly(x*y, x, y) == Poly(x, x)) is False + + assert (Poly(x, x, y) == Poly(x, x)) is False + assert (Poly(x, x) == Poly(x, x, y)) is False + + assert (Poly(x**2 + 1, x) == Poly(y**2 + 1, y)) is False + assert (Poly(y**2 + 1, y) == Poly(x**2 + 1, x)) is False + + f = Poly(x, x, domain=ZZ) + g = Poly(x, x, domain=QQ) + + assert f.eq(g) is False + assert f.ne(g) is True + + assert f.eq(g, strict=True) is False + assert f.ne(g, strict=True) is True + + t0 = Symbol('t0') + + f = Poly((t0/2 + x**2)*t**2 - x**2*t, t, domain='QQ[x,t0]') + g = Poly((t0/2 + x**2)*t**2 - x**2*t, t, domain='ZZ(x,t0)') + + assert (f == g) is False + + +def test_PurePoly__eq__(): + assert (PurePoly(x, x) == PurePoly(x, x)) is True + assert (PurePoly(x, x, domain=QQ) == PurePoly(x, x)) is True + assert (PurePoly(x, x) == PurePoly(x, x, domain=QQ)) is True + + assert (PurePoly(x, x, domain=ZZ[a]) == PurePoly(x, x)) is True + assert (PurePoly(x, x) == PurePoly(x, x, domain=ZZ[a])) is True + + assert (PurePoly(x*y, x, y) == PurePoly(x, x)) is False + + assert (PurePoly(x, x, y) == PurePoly(x, x)) is False + assert (PurePoly(x, x) == PurePoly(x, x, y)) is False + + assert (PurePoly(x**2 + 1, x) == PurePoly(y**2 + 1, y)) is True + assert (PurePoly(y**2 + 1, y) == PurePoly(x**2 + 1, x)) is True + + f = PurePoly(x, x, domain=ZZ) + g = PurePoly(x, x, domain=QQ) + + assert f.eq(g) is True + assert f.ne(g) is False + + assert f.eq(g, strict=True) is False + assert f.ne(g, strict=True) is True + + f = PurePoly(x, x, domain=ZZ) + g = PurePoly(y, y, domain=QQ) + + assert f.eq(g) is True + assert f.ne(g) is False + + assert f.eq(g, strict=True) is False + assert f.ne(g, strict=True) is True + + +def test_PurePoly_Poly(): + assert isinstance(PurePoly(Poly(x**2 + 1)), PurePoly) is True + assert isinstance(Poly(PurePoly(x**2 + 1)), Poly) is True + + +def test_Poly_get_domain(): + assert Poly(2*x).get_domain() == ZZ + + assert Poly(2*x, domain='ZZ').get_domain() == ZZ + assert Poly(2*x, domain='QQ').get_domain() == QQ + + assert Poly(x/2).get_domain() == QQ + + raises(CoercionFailed, lambda: Poly(x/2, domain='ZZ')) + assert Poly(x/2, domain='QQ').get_domain() == QQ + + assert isinstance(Poly(0.2*x).get_domain(), RealField) + + +def test_Poly_set_domain(): + assert Poly(2*x + 1).set_domain(ZZ) == Poly(2*x + 1) + assert Poly(2*x + 1).set_domain('ZZ') == Poly(2*x + 1) + + assert Poly(2*x + 1).set_domain(QQ) == Poly(2*x + 1, domain='QQ') + assert Poly(2*x + 1).set_domain('QQ') == Poly(2*x + 1, domain='QQ') + + assert Poly(Rational(2, 10)*x + Rational(1, 10)).set_domain('RR') == Poly(0.2*x + 0.1) + assert Poly(0.2*x + 0.1).set_domain('QQ') == Poly(Rational(2, 10)*x + Rational(1, 10)) + + raises(CoercionFailed, lambda: Poly(x/2 + 1).set_domain(ZZ)) + raises(CoercionFailed, lambda: Poly(x + 1, modulus=2).set_domain(QQ)) + + raises(GeneratorsError, lambda: Poly(x*y, x, y).set_domain(ZZ[y])) + + +def test_Poly_get_modulus(): + assert Poly(x**2 + 1, modulus=2).get_modulus() == 2 + raises(PolynomialError, lambda: Poly(x**2 + 1).get_modulus()) + + +def test_Poly_set_modulus(): + assert Poly( + x**2 + 1, modulus=2).set_modulus(7) == Poly(x**2 + 1, modulus=7) + assert Poly( + x**2 + 5, modulus=7).set_modulus(2) == Poly(x**2 + 1, modulus=2) + + assert Poly(x**2 + 1).set_modulus(2) == Poly(x**2 + 1, modulus=2) + + raises(CoercionFailed, lambda: Poly(x/2 + 1).set_modulus(2)) + + +def test_Poly_add_ground(): + assert Poly(x + 1).add_ground(2) == Poly(x + 3) + + +def test_Poly_sub_ground(): + assert Poly(x + 1).sub_ground(2) == Poly(x - 1) + + +def test_Poly_mul_ground(): + assert Poly(x + 1).mul_ground(2) == Poly(2*x + 2) + + +def test_Poly_quo_ground(): + assert Poly(2*x + 4).quo_ground(2) == Poly(x + 2) + assert Poly(2*x + 3).quo_ground(2) == Poly(x + 1) + + +def test_Poly_exquo_ground(): + assert Poly(2*x + 4).exquo_ground(2) == Poly(x + 2) + raises(ExactQuotientFailed, lambda: Poly(2*x + 3).exquo_ground(2)) + + +def test_Poly_abs(): + assert Poly(-x + 1, x).abs() == abs(Poly(-x + 1, x)) == Poly(x + 1, x) + + +def test_Poly_neg(): + assert Poly(-x + 1, x).neg() == -Poly(-x + 1, x) == Poly(x - 1, x) + + +def test_Poly_add(): + assert Poly(0, x).add(Poly(0, x)) == Poly(0, x) + assert Poly(0, x) + Poly(0, x) == Poly(0, x) + + assert Poly(1, x).add(Poly(0, x)) == Poly(1, x) + assert Poly(1, x, y) + Poly(0, x) == Poly(1, x, y) + assert Poly(0, x).add(Poly(1, x, y)) == Poly(1, x, y) + assert Poly(0, x, y) + Poly(1, x, y) == Poly(1, x, y) + + assert Poly(1, x) + x == Poly(x + 1, x) + with warns_deprecated_sympy(): + Poly(1, x) + sin(x) + + assert Poly(x, x) + 1 == Poly(x + 1, x) + assert 1 + Poly(x, x) == Poly(x + 1, x) + + +def test_Poly_sub(): + assert Poly(0, x).sub(Poly(0, x)) == Poly(0, x) + assert Poly(0, x) - Poly(0, x) == Poly(0, x) + + assert Poly(1, x).sub(Poly(0, x)) == Poly(1, x) + assert Poly(1, x, y) - Poly(0, x) == Poly(1, x, y) + assert Poly(0, x).sub(Poly(1, x, y)) == Poly(-1, x, y) + assert Poly(0, x, y) - Poly(1, x, y) == Poly(-1, x, y) + + assert Poly(1, x) - x == Poly(1 - x, x) + with warns_deprecated_sympy(): + Poly(1, x) - sin(x) + + assert Poly(x, x) - 1 == Poly(x - 1, x) + assert 1 - Poly(x, x) == Poly(1 - x, x) + + +def test_Poly_mul(): + assert Poly(0, x).mul(Poly(0, x)) == Poly(0, x) + assert Poly(0, x) * Poly(0, x) == Poly(0, x) + + assert Poly(2, x).mul(Poly(4, x)) == Poly(8, x) + assert Poly(2, x, y) * Poly(4, x) == Poly(8, x, y) + assert Poly(4, x).mul(Poly(2, x, y)) == Poly(8, x, y) + assert Poly(4, x, y) * Poly(2, x, y) == Poly(8, x, y) + + assert Poly(1, x) * x == Poly(x, x) + with warns_deprecated_sympy(): + Poly(1, x) * sin(x) + + assert Poly(x, x) * 2 == Poly(2*x, x) + assert 2 * Poly(x, x) == Poly(2*x, x) + +def test_issue_13079(): + assert Poly(x)*x == Poly(x**2, x, domain='ZZ') + assert x*Poly(x) == Poly(x**2, x, domain='ZZ') + assert -2*Poly(x) == Poly(-2*x, x, domain='ZZ') + assert S(-2)*Poly(x) == Poly(-2*x, x, domain='ZZ') + assert Poly(x)*S(-2) == Poly(-2*x, x, domain='ZZ') + +def test_Poly_sqr(): + assert Poly(x*y, x, y).sqr() == Poly(x**2*y**2, x, y) + + +def test_Poly_pow(): + assert Poly(x, x).pow(10) == Poly(x**10, x) + assert Poly(x, x).pow(Integer(10)) == Poly(x**10, x) + + assert Poly(2*y, x, y).pow(4) == Poly(16*y**4, x, y) + assert Poly(2*y, x, y).pow(Integer(4)) == Poly(16*y**4, x, y) + + assert Poly(7*x*y, x, y)**3 == Poly(343*x**3*y**3, x, y) + + raises(TypeError, lambda: Poly(x*y + 1, x, y)**(-1)) + raises(TypeError, lambda: Poly(x*y + 1, x, y)**x) + + +def test_Poly_divmod(): + f, g = Poly(x**2), Poly(x) + q, r = g, Poly(0, x) + + assert divmod(f, g) == (q, r) + assert f // g == q + assert f % g == r + + assert divmod(f, x) == (q, r) + assert f // x == q + assert f % x == r + + q, r = Poly(0, x), Poly(2, x) + + assert divmod(2, g) == (q, r) + assert 2 // g == q + assert 2 % g == r + + assert Poly(x)/Poly(x) == 1 + assert Poly(x**2)/Poly(x) == x + assert Poly(x)/Poly(x**2) == 1/x + + +def test_Poly_eq_ne(): + assert (Poly(x + y, x, y) == Poly(x + y, x, y)) is True + assert (Poly(x + y, x) == Poly(x + y, x, y)) is False + assert (Poly(x + y, x, y) == Poly(x + y, x)) is False + assert (Poly(x + y, x) == Poly(x + y, x)) is True + assert (Poly(x + y, y) == Poly(x + y, y)) is True + + assert (Poly(x + y, x, y) == x + y) is True + assert (Poly(x + y, x) == x + y) is True + assert (Poly(x + y, x, y) == x + y) is True + assert (Poly(x + y, x) == x + y) is True + assert (Poly(x + y, y) == x + y) is True + + assert (Poly(x + y, x, y) != Poly(x + y, x, y)) is False + assert (Poly(x + y, x) != Poly(x + y, x, y)) is True + assert (Poly(x + y, x, y) != Poly(x + y, x)) is True + assert (Poly(x + y, x) != Poly(x + y, x)) is False + assert (Poly(x + y, y) != Poly(x + y, y)) is False + + assert (Poly(x + y, x, y) != x + y) is False + assert (Poly(x + y, x) != x + y) is False + assert (Poly(x + y, x, y) != x + y) is False + assert (Poly(x + y, x) != x + y) is False + assert (Poly(x + y, y) != x + y) is False + + assert (Poly(x, x) == sin(x)) is False + assert (Poly(x, x) != sin(x)) is True + + +def test_Poly_nonzero(): + assert not bool(Poly(0, x)) is True + assert not bool(Poly(1, x)) is False + + +def test_Poly_properties(): + assert Poly(0, x).is_zero is True + assert Poly(1, x).is_zero is False + + assert Poly(1, x).is_one is True + assert Poly(2, x).is_one is False + + assert Poly(x - 1, x).is_sqf is True + assert Poly((x - 1)**2, x).is_sqf is False + + assert Poly(x - 1, x).is_monic is True + assert Poly(2*x - 1, x).is_monic is False + + assert Poly(3*x + 2, x).is_primitive is True + assert Poly(4*x + 2, x).is_primitive is False + + assert Poly(1, x).is_ground is True + assert Poly(x, x).is_ground is False + + assert Poly(x + y + z + 1).is_linear is True + assert Poly(x*y*z + 1).is_linear is False + + assert Poly(x*y + z + 1).is_quadratic is True + assert Poly(x*y*z + 1).is_quadratic is False + + assert Poly(x*y).is_monomial is True + assert Poly(x*y + 1).is_monomial is False + + assert Poly(x**2 + x*y).is_homogeneous is True + assert Poly(x**3 + x*y).is_homogeneous is False + + assert Poly(x).is_univariate is True + assert Poly(x*y).is_univariate is False + + assert Poly(x*y).is_multivariate is True + assert Poly(x).is_multivariate is False + + assert Poly( + x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1).is_cyclotomic is False + assert Poly( + x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1).is_cyclotomic is True + + +def test_Poly_is_irreducible(): + assert Poly(x**2 + x + 1).is_irreducible is True + assert Poly(x**2 + 2*x + 1).is_irreducible is False + + assert Poly(7*x + 3, modulus=11).is_irreducible is True + assert Poly(7*x**2 + 3*x + 1, modulus=11).is_irreducible is False + + +def test_Poly_subs(): + assert Poly(x + 1).subs(x, 0) == 1 + + assert Poly(x + 1).subs(x, x) == Poly(x + 1) + assert Poly(x + 1).subs(x, y) == Poly(y + 1) + + assert Poly(x*y, x).subs(y, x) == x**2 + assert Poly(x*y, x).subs(x, y) == y**2 + + +def test_Poly_replace(): + assert Poly(x + 1).replace(x) == Poly(x + 1) + assert Poly(x + 1).replace(y) == Poly(y + 1) + + raises(PolynomialError, lambda: Poly(x + y).replace(z)) + + assert Poly(x + 1).replace(x, x) == Poly(x + 1) + assert Poly(x + 1).replace(x, y) == Poly(y + 1) + + assert Poly(x + y).replace(x, x) == Poly(x + y) + assert Poly(x + y).replace(x, z) == Poly(z + y, z, y) + + assert Poly(x + y).replace(y, y) == Poly(x + y) + assert Poly(x + y).replace(y, z) == Poly(x + z, x, z) + assert Poly(x + y).replace(z, t) == Poly(x + y) + + raises(PolynomialError, lambda: Poly(x + y).replace(x, y)) + + assert Poly(x + y, x).replace(x, z) == Poly(z + y, z) + assert Poly(x + y, y).replace(y, z) == Poly(x + z, z) + + raises(PolynomialError, lambda: Poly(x + y, x).replace(x, y)) + raises(PolynomialError, lambda: Poly(x + y, y).replace(y, x)) + + +def test_Poly_reorder(): + raises(PolynomialError, lambda: Poly(x + y).reorder(x, z)) + + assert Poly(x + y, x, y).reorder(x, y) == Poly(x + y, x, y) + assert Poly(x + y, x, y).reorder(y, x) == Poly(x + y, y, x) + + assert Poly(x + y, y, x).reorder(x, y) == Poly(x + y, x, y) + assert Poly(x + y, y, x).reorder(y, x) == Poly(x + y, y, x) + + assert Poly(x + y, x, y).reorder(wrt=x) == Poly(x + y, x, y) + assert Poly(x + y, x, y).reorder(wrt=y) == Poly(x + y, y, x) + + +def test_Poly_ltrim(): + f = Poly(y**2 + y*z**2, x, y, z).ltrim(y) + assert f.as_expr() == y**2 + y*z**2 and f.gens == (y, z) + assert Poly(x*y - x, z, x, y).ltrim(1) == Poly(x*y - x, x, y) + + raises(PolynomialError, lambda: Poly(x*y**2 + y**2, x, y).ltrim(y)) + raises(PolynomialError, lambda: Poly(x*y - x, x, y).ltrim(-1)) + +def test_Poly_has_only_gens(): + assert Poly(x*y + 1, x, y, z).has_only_gens(x, y) is True + assert Poly(x*y + z, x, y, z).has_only_gens(x, y) is False + + raises(GeneratorsError, lambda: Poly(x*y**2 + y**2, x, y).has_only_gens(t)) + + +def test_Poly_to_ring(): + assert Poly(2*x + 1, domain='ZZ').to_ring() == Poly(2*x + 1, domain='ZZ') + assert Poly(2*x + 1, domain='QQ').to_ring() == Poly(2*x + 1, domain='ZZ') + + raises(CoercionFailed, lambda: Poly(x/2 + 1).to_ring()) + raises(DomainError, lambda: Poly(2*x + 1, modulus=3).to_ring()) + + +def test_Poly_to_field(): + assert Poly(2*x + 1, domain='ZZ').to_field() == Poly(2*x + 1, domain='QQ') + assert Poly(2*x + 1, domain='QQ').to_field() == Poly(2*x + 1, domain='QQ') + + assert Poly(x/2 + 1, domain='QQ').to_field() == Poly(x/2 + 1, domain='QQ') + assert Poly(2*x + 1, modulus=3).to_field() == Poly(2*x + 1, modulus=3) + + assert Poly(2.0*x + 1.0).to_field() == Poly(2.0*x + 1.0) + + +def test_Poly_to_exact(): + assert Poly(2*x).to_exact() == Poly(2*x) + assert Poly(x/2).to_exact() == Poly(x/2) + + assert Poly(0.1*x).to_exact() == Poly(x/10) + + +def test_Poly_retract(): + f = Poly(x**2 + 1, x, domain=QQ[y]) + + assert f.retract() == Poly(x**2 + 1, x, domain='ZZ') + assert f.retract(field=True) == Poly(x**2 + 1, x, domain='QQ') + + assert Poly(0, x, y).retract() == Poly(0, x, y) + + +def test_Poly_slice(): + f = Poly(x**3 + 2*x**2 + 3*x + 4) + + assert f.slice(0, 0) == Poly(0, x) + assert f.slice(0, 1) == Poly(4, x) + assert f.slice(0, 2) == Poly(3*x + 4, x) + assert f.slice(0, 3) == Poly(2*x**2 + 3*x + 4, x) + assert f.slice(0, 4) == Poly(x**3 + 2*x**2 + 3*x + 4, x) + + assert f.slice(x, 0, 0) == Poly(0, x) + assert f.slice(x, 0, 1) == Poly(4, x) + assert f.slice(x, 0, 2) == Poly(3*x + 4, x) + assert f.slice(x, 0, 3) == Poly(2*x**2 + 3*x + 4, x) + assert f.slice(x, 0, 4) == Poly(x**3 + 2*x**2 + 3*x + 4, x) + + g = Poly(x**3 + 1) + + assert g.slice(0, 3) == Poly(1, x) + + +def test_Poly_coeffs(): + assert Poly(0, x).coeffs() == [0] + assert Poly(1, x).coeffs() == [1] + + assert Poly(2*x + 1, x).coeffs() == [2, 1] + + assert Poly(7*x**2 + 2*x + 1, x).coeffs() == [7, 2, 1] + assert Poly(7*x**4 + 2*x + 1, x).coeffs() == [7, 2, 1] + + assert Poly(x*y**7 + 2*x**2*y**3).coeffs('lex') == [2, 1] + assert Poly(x*y**7 + 2*x**2*y**3).coeffs('grlex') == [1, 2] + + +def test_Poly_monoms(): + assert Poly(0, x).monoms() == [(0,)] + assert Poly(1, x).monoms() == [(0,)] + + assert Poly(2*x + 1, x).monoms() == [(1,), (0,)] + + assert Poly(7*x**2 + 2*x + 1, x).monoms() == [(2,), (1,), (0,)] + assert Poly(7*x**4 + 2*x + 1, x).monoms() == [(4,), (1,), (0,)] + + assert Poly(x*y**7 + 2*x**2*y**3).monoms('lex') == [(2, 3), (1, 7)] + assert Poly(x*y**7 + 2*x**2*y**3).monoms('grlex') == [(1, 7), (2, 3)] + + +def test_Poly_terms(): + assert Poly(0, x).terms() == [((0,), 0)] + assert Poly(1, x).terms() == [((0,), 1)] + + assert Poly(2*x + 1, x).terms() == [((1,), 2), ((0,), 1)] + + assert Poly(7*x**2 + 2*x + 1, x).terms() == [((2,), 7), ((1,), 2), ((0,), 1)] + assert Poly(7*x**4 + 2*x + 1, x).terms() == [((4,), 7), ((1,), 2), ((0,), 1)] + + assert Poly( + x*y**7 + 2*x**2*y**3).terms('lex') == [((2, 3), 2), ((1, 7), 1)] + assert Poly( + x*y**7 + 2*x**2*y**3).terms('grlex') == [((1, 7), 1), ((2, 3), 2)] + + +def test_Poly_all_coeffs(): + assert Poly(0, x).all_coeffs() == [0] + assert Poly(1, x).all_coeffs() == [1] + + assert Poly(2*x + 1, x).all_coeffs() == [2, 1] + + assert Poly(7*x**2 + 2*x + 1, x).all_coeffs() == [7, 2, 1] + assert Poly(7*x**4 + 2*x + 1, x).all_coeffs() == [7, 0, 0, 2, 1] + + +def test_Poly_all_monoms(): + assert Poly(0, x).all_monoms() == [(0,)] + assert Poly(1, x).all_monoms() == [(0,)] + + assert Poly(2*x + 1, x).all_monoms() == [(1,), (0,)] + + assert Poly(7*x**2 + 2*x + 1, x).all_monoms() == [(2,), (1,), (0,)] + assert Poly(7*x**4 + 2*x + 1, x).all_monoms() == [(4,), (3,), (2,), (1,), (0,)] + + +def test_Poly_all_terms(): + assert Poly(0, x).all_terms() == [((0,), 0)] + assert Poly(1, x).all_terms() == [((0,), 1)] + + assert Poly(2*x + 1, x).all_terms() == [((1,), 2), ((0,), 1)] + + assert Poly(7*x**2 + 2*x + 1, x).all_terms() == \ + [((2,), 7), ((1,), 2), ((0,), 1)] + assert Poly(7*x**4 + 2*x + 1, x).all_terms() == \ + [((4,), 7), ((3,), 0), ((2,), 0), ((1,), 2), ((0,), 1)] + + +def test_Poly_termwise(): + f = Poly(x**2 + 20*x + 400) + g = Poly(x**2 + 2*x + 4) + + def func(monom, coeff): + (k,) = monom + return coeff//10**(2 - k) + + assert f.termwise(func) == g + + def func(monom, coeff): + (k,) = monom + return (k,), coeff//10**(2 - k) + + assert f.termwise(func) == g + + +def test_Poly_length(): + assert Poly(0, x).length() == 0 + assert Poly(1, x).length() == 1 + assert Poly(x, x).length() == 1 + + assert Poly(x + 1, x).length() == 2 + assert Poly(x**2 + 1, x).length() == 2 + assert Poly(x**2 + x + 1, x).length() == 3 + + +def test_Poly_as_dict(): + assert Poly(0, x).as_dict() == {} + assert Poly(0, x, y, z).as_dict() == {} + + assert Poly(1, x).as_dict() == {(0,): 1} + assert Poly(1, x, y, z).as_dict() == {(0, 0, 0): 1} + + assert Poly(x**2 + 3, x).as_dict() == {(2,): 1, (0,): 3} + assert Poly(x**2 + 3, x, y, z).as_dict() == {(2, 0, 0): 1, (0, 0, 0): 3} + + assert Poly(3*x**2*y*z**3 + 4*x*y + 5*x*z).as_dict() == {(2, 1, 3): 3, + (1, 1, 0): 4, (1, 0, 1): 5} + + +def test_Poly_as_expr(): + assert Poly(0, x).as_expr() == 0 + assert Poly(0, x, y, z).as_expr() == 0 + + assert Poly(1, x).as_expr() == 1 + assert Poly(1, x, y, z).as_expr() == 1 + + assert Poly(x**2 + 3, x).as_expr() == x**2 + 3 + assert Poly(x**2 + 3, x, y, z).as_expr() == x**2 + 3 + + assert Poly( + 3*x**2*y*z**3 + 4*x*y + 5*x*z).as_expr() == 3*x**2*y*z**3 + 4*x*y + 5*x*z + + f = Poly(x**2 + 2*x*y**2 - y, x, y) + + assert f.as_expr() == -y + x**2 + 2*x*y**2 + + assert f.as_expr({x: 5}) == 25 - y + 10*y**2 + assert f.as_expr({y: 6}) == -6 + 72*x + x**2 + + assert f.as_expr({x: 5, y: 6}) == 379 + assert f.as_expr(5, 6) == 379 + + raises(GeneratorsError, lambda: f.as_expr({z: 7})) + + +def test_Poly_lift(): + p = Poly(x**4 - I*x + 17*I, x, gaussian=True) + assert p.lift() == Poly(x**8 + x**2 - 34*x + 289, x, domain='QQ') + + +def test_Poly_lift_multiple(): + + r1 = rootof(y**3 + y**2 - 1, 0) + r2 = rootof(z**5 + z**2 - 1, 0) + p = Poly(r1*x + 3*r1**2 - r2 + x**2 - x**5, x, extension=True) + + assert p.lift() == Poly( + -x**75 + 15*x**72 - 5*x**71 + 15*x**70 - 105*x**69 + 70*x**68 - + 220*x**67 + 560*x**66 - 635*x**65 + 1495*x**64 - 2735*x**63 + + 4415*x**62 - 7410*x**61 + 12741*x**60 - 22090*x**59 + 32125*x**58 - + 56281*x**57 + 88157*x**56 - 126842*x**55 + 214223*x**54 - 311802*x**53 + + 462667*x**52 - 700883*x**51 + 1006278*x**50 - 1480950*x**49 + + 2078055*x**48 - 3004675*x**47 + 4140410*x**46 - 5664222*x**45 + + 8029445*x**44 - 10528785*x**43 + 14309614*x**42 - 19032988*x**41 + + 24570573*x**40 - 32530459*x**39 + 41239581*x**38 - 52968051*x**37 + + 65891606*x**36 - 81997276*x**35 + 102530732*x**34 - 122009994*x**33 + + 150227996*x**32 - 176452478*x**31 + 206393768*x**30 - 245291426*x**29 + + 276598718*x**28 - 320005297*x**27 + 353649032*x**26 + - 393246309*x**25 + 434566186*x**24 - 460608964*x**23 + 508052079*x**22 + - 513976618*x**21 + 539374498*x**20 - 557851717*x**19 + 540788016*x**18 + - 564949060*x**17 + 520866566*x**16 + - 507861375*x**15 + 474999819*x**14 - 423619160*x**13 + 414540540*x**12 + - 322522367*x**11 + 311586511*x**10 - 238812299*x**9 + 184482053*x**8 + - 189265274*x**7 + 93619528*x**6 - 106852385*x**5 + 57294385*x**4 - + 26486666*x**3 + 42614683*x**2 - 1511583*x + 15975845, x, domain='QQ' + ) + + +def test_Poly_deflate(): + assert Poly(0, x).deflate() == ((1,), Poly(0, x)) + assert Poly(1, x).deflate() == ((1,), Poly(1, x)) + assert Poly(x, x).deflate() == ((1,), Poly(x, x)) + + assert Poly(x**2, x).deflate() == ((2,), Poly(x, x)) + assert Poly(x**17, x).deflate() == ((17,), Poly(x, x)) + + assert Poly( + x**2*y*z**11 + x**4*z**11).deflate() == ((2, 1, 11), Poly(x*y*z + x**2*z)) + + +def test_Poly_inject(): + f = Poly(x**2*y + x*y**3 + x*y + 1, x) + + assert f.inject() == Poly(x**2*y + x*y**3 + x*y + 1, x, y) + assert f.inject(front=True) == Poly(y**3*x + y*x**2 + y*x + 1, y, x) + + +def test_Poly_eject(): + f = Poly(x**2*y + x*y**3 + x*y + 1, x, y) + + assert f.eject(x) == Poly(x*y**3 + (x**2 + x)*y + 1, y, domain='ZZ[x]') + assert f.eject(y) == Poly(y*x**2 + (y**3 + y)*x + 1, x, domain='ZZ[y]') + + ex = x + y + z + t + w + g = Poly(ex, x, y, z, t, w) + + assert g.eject(x) == Poly(ex, y, z, t, w, domain='ZZ[x]') + assert g.eject(x, y) == Poly(ex, z, t, w, domain='ZZ[x, y]') + assert g.eject(x, y, z) == Poly(ex, t, w, domain='ZZ[x, y, z]') + assert g.eject(w) == Poly(ex, x, y, z, t, domain='ZZ[w]') + assert g.eject(t, w) == Poly(ex, x, y, z, domain='ZZ[t, w]') + assert g.eject(z, t, w) == Poly(ex, x, y, domain='ZZ[z, t, w]') + + raises(DomainError, lambda: Poly(x*y, x, y, domain=ZZ[z]).eject(y)) + raises(NotImplementedError, lambda: Poly(x*y, x, y, z).eject(y)) + + +def test_Poly_exclude(): + assert Poly(x, x, y).exclude() == Poly(x, x) + assert Poly(x*y, x, y).exclude() == Poly(x*y, x, y) + assert Poly(1, x, y).exclude() == Poly(1, x, y) + + +def test_Poly__gen_to_level(): + assert Poly(1, x, y)._gen_to_level(-2) == 0 + assert Poly(1, x, y)._gen_to_level(-1) == 1 + assert Poly(1, x, y)._gen_to_level( 0) == 0 + assert Poly(1, x, y)._gen_to_level( 1) == 1 + + raises(PolynomialError, lambda: Poly(1, x, y)._gen_to_level(-3)) + raises(PolynomialError, lambda: Poly(1, x, y)._gen_to_level( 2)) + + assert Poly(1, x, y)._gen_to_level(x) == 0 + assert Poly(1, x, y)._gen_to_level(y) == 1 + + assert Poly(1, x, y)._gen_to_level('x') == 0 + assert Poly(1, x, y)._gen_to_level('y') == 1 + + raises(PolynomialError, lambda: Poly(1, x, y)._gen_to_level(z)) + raises(PolynomialError, lambda: Poly(1, x, y)._gen_to_level('z')) + + +def test_Poly_degree(): + assert Poly(0, x).degree() is -oo + assert Poly(1, x).degree() == 0 + assert Poly(x, x).degree() == 1 + + assert Poly(0, x).degree(gen=0) is -oo + assert Poly(1, x).degree(gen=0) == 0 + assert Poly(x, x).degree(gen=0) == 1 + + assert Poly(0, x).degree(gen=x) is -oo + assert Poly(1, x).degree(gen=x) == 0 + assert Poly(x, x).degree(gen=x) == 1 + + assert Poly(0, x).degree(gen='x') is -oo + assert Poly(1, x).degree(gen='x') == 0 + assert Poly(x, x).degree(gen='x') == 1 + + raises(PolynomialError, lambda: Poly(1, x).degree(gen=1)) + raises(PolynomialError, lambda: Poly(1, x).degree(gen=y)) + raises(PolynomialError, lambda: Poly(1, x).degree(gen='y')) + + assert Poly(1, x, y).degree() == 0 + assert Poly(2*y, x, y).degree() == 0 + assert Poly(x*y, x, y).degree() == 1 + + assert Poly(1, x, y).degree(gen=x) == 0 + assert Poly(2*y, x, y).degree(gen=x) == 0 + assert Poly(x*y, x, y).degree(gen=x) == 1 + + assert Poly(1, x, y).degree(gen=y) == 0 + assert Poly(2*y, x, y).degree(gen=y) == 1 + assert Poly(x*y, x, y).degree(gen=y) == 1 + + assert degree(0, x) is -oo + assert degree(1, x) == 0 + assert degree(x, x) == 1 + + assert degree(x*y**2, x) == 1 + assert degree(x*y**2, y) == 2 + assert degree(x*y**2, z) == 0 + + assert degree(pi) == 1 + + raises(TypeError, lambda: degree(y**2 + x**3)) + raises(TypeError, lambda: degree(y**2 + x**3, 1)) + raises(PolynomialError, lambda: degree(x, 1.1)) + raises(PolynomialError, lambda: degree(x**2/(x**3 + 1), x)) + + assert degree(Poly(0,x),z) is -oo + assert degree(Poly(1,x),z) == 0 + assert degree(Poly(x**2+y**3,y)) == 3 + assert degree(Poly(y**2 + x**3, y, x), 1) == 3 + assert degree(Poly(y**2 + x**3, x), z) == 0 + assert degree(Poly(y**2 + x**3 + z**4, x), z) == 4 + +def test_Poly_degree_list(): + assert Poly(0, x).degree_list() == (-oo,) + assert Poly(0, x, y).degree_list() == (-oo, -oo) + assert Poly(0, x, y, z).degree_list() == (-oo, -oo, -oo) + + assert Poly(1, x).degree_list() == (0,) + assert Poly(1, x, y).degree_list() == (0, 0) + assert Poly(1, x, y, z).degree_list() == (0, 0, 0) + + assert Poly(x**2*y + x**3*z**2 + 1).degree_list() == (3, 1, 2) + + assert degree_list(1, x) == (0,) + assert degree_list(x, x) == (1,) + + assert degree_list(x*y**2) == (1, 2) + + raises(ComputationFailed, lambda: degree_list(1)) + + +def test_Poly_total_degree(): + assert Poly(x**2*y + x**3*z**2 + 1).total_degree() == 5 + assert Poly(x**2 + z**3).total_degree() == 3 + assert Poly(x*y*z + z**4).total_degree() == 4 + assert Poly(x**3 + x + 1).total_degree() == 3 + + assert total_degree(x*y + z**3) == 3 + assert total_degree(x*y + z**3, x, y) == 2 + assert total_degree(1) == 0 + assert total_degree(Poly(y**2 + x**3 + z**4)) == 4 + assert total_degree(Poly(y**2 + x**3 + z**4, x)) == 3 + assert total_degree(Poly(y**2 + x**3 + z**4, x), z) == 4 + assert total_degree(Poly(x**9 + x*z*y + x**3*z**2 + z**7,x), z) == 7 + +def test_Poly_homogenize(): + assert Poly(x**2+y).homogenize(z) == Poly(x**2+y*z) + assert Poly(x+y).homogenize(z) == Poly(x+y, x, y, z) + assert Poly(x+y**2).homogenize(y) == Poly(x*y+y**2) + + +def test_Poly_homogeneous_order(): + assert Poly(0, x, y).homogeneous_order() is -oo + assert Poly(1, x, y).homogeneous_order() == 0 + assert Poly(x, x, y).homogeneous_order() == 1 + assert Poly(x*y, x, y).homogeneous_order() == 2 + + assert Poly(x + 1, x, y).homogeneous_order() is None + assert Poly(x*y + x, x, y).homogeneous_order() is None + + assert Poly(x**5 + 2*x**3*y**2 + 9*x*y**4).homogeneous_order() == 5 + assert Poly(x**5 + 2*x**3*y**3 + 9*x*y**4).homogeneous_order() is None + + +def test_Poly_LC(): + assert Poly(0, x).LC() == 0 + assert Poly(1, x).LC() == 1 + assert Poly(2*x**2 + x, x).LC() == 2 + + assert Poly(x*y**7 + 2*x**2*y**3).LC('lex') == 2 + assert Poly(x*y**7 + 2*x**2*y**3).LC('grlex') == 1 + + assert LC(x*y**7 + 2*x**2*y**3, order='lex') == 2 + assert LC(x*y**7 + 2*x**2*y**3, order='grlex') == 1 + + +def test_Poly_TC(): + assert Poly(0, x).TC() == 0 + assert Poly(1, x).TC() == 1 + assert Poly(2*x**2 + x, x).TC() == 0 + + +def test_Poly_EC(): + assert Poly(0, x).EC() == 0 + assert Poly(1, x).EC() == 1 + assert Poly(2*x**2 + x, x).EC() == 1 + + assert Poly(x*y**7 + 2*x**2*y**3).EC('lex') == 1 + assert Poly(x*y**7 + 2*x**2*y**3).EC('grlex') == 2 + + +def test_Poly_coeff(): + assert Poly(0, x).coeff_monomial(1) == 0 + assert Poly(0, x).coeff_monomial(x) == 0 + + assert Poly(1, x).coeff_monomial(1) == 1 + assert Poly(1, x).coeff_monomial(x) == 0 + + assert Poly(x**8, x).coeff_monomial(1) == 0 + assert Poly(x**8, x).coeff_monomial(x**7) == 0 + assert Poly(x**8, x).coeff_monomial(x**8) == 1 + assert Poly(x**8, x).coeff_monomial(x**9) == 0 + + assert Poly(3*x*y**2 + 1, x, y).coeff_monomial(1) == 1 + assert Poly(3*x*y**2 + 1, x, y).coeff_monomial(x*y**2) == 3 + + p = Poly(24*x*y*exp(8) + 23*x, x, y) + + assert p.coeff_monomial(x) == 23 + assert p.coeff_monomial(y) == 0 + assert p.coeff_monomial(x*y) == 24*exp(8) + + assert p.as_expr().coeff(x) == 24*y*exp(8) + 23 + raises(NotImplementedError, lambda: p.coeff(x)) + + raises(ValueError, lambda: Poly(x + 1).coeff_monomial(0)) + raises(ValueError, lambda: Poly(x + 1).coeff_monomial(3*x)) + raises(ValueError, lambda: Poly(x + 1).coeff_monomial(3*x*y)) + + +def test_Poly_nth(): + assert Poly(0, x).nth(0) == 0 + assert Poly(0, x).nth(1) == 0 + + assert Poly(1, x).nth(0) == 1 + assert Poly(1, x).nth(1) == 0 + + assert Poly(x**8, x).nth(0) == 0 + assert Poly(x**8, x).nth(7) == 0 + assert Poly(x**8, x).nth(8) == 1 + assert Poly(x**8, x).nth(9) == 0 + + assert Poly(3*x*y**2 + 1, x, y).nth(0, 0) == 1 + assert Poly(3*x*y**2 + 1, x, y).nth(1, 2) == 3 + + raises(ValueError, lambda: Poly(x*y + 1, x, y).nth(1)) + + +def test_Poly_LM(): + assert Poly(0, x).LM() == (0,) + assert Poly(1, x).LM() == (0,) + assert Poly(2*x**2 + x, x).LM() == (2,) + + assert Poly(x*y**7 + 2*x**2*y**3).LM('lex') == (2, 3) + assert Poly(x*y**7 + 2*x**2*y**3).LM('grlex') == (1, 7) + + assert LM(x*y**7 + 2*x**2*y**3, order='lex') == x**2*y**3 + assert LM(x*y**7 + 2*x**2*y**3, order='grlex') == x*y**7 + + +def test_Poly_LM_custom_order(): + f = Poly(x**2*y**3*z + x**2*y*z**3 + x*y*z + 1) + rev_lex = lambda monom: tuple(reversed(monom)) + + assert f.LM(order='lex') == (2, 3, 1) + assert f.LM(order=rev_lex) == (2, 1, 3) + + +def test_Poly_EM(): + assert Poly(0, x).EM() == (0,) + assert Poly(1, x).EM() == (0,) + assert Poly(2*x**2 + x, x).EM() == (1,) + + assert Poly(x*y**7 + 2*x**2*y**3).EM('lex') == (1, 7) + assert Poly(x*y**7 + 2*x**2*y**3).EM('grlex') == (2, 3) + + +def test_Poly_LT(): + assert Poly(0, x).LT() == ((0,), 0) + assert Poly(1, x).LT() == ((0,), 1) + assert Poly(2*x**2 + x, x).LT() == ((2,), 2) + + assert Poly(x*y**7 + 2*x**2*y**3).LT('lex') == ((2, 3), 2) + assert Poly(x*y**7 + 2*x**2*y**3).LT('grlex') == ((1, 7), 1) + + assert LT(x*y**7 + 2*x**2*y**3, order='lex') == 2*x**2*y**3 + assert LT(x*y**7 + 2*x**2*y**3, order='grlex') == x*y**7 + + +def test_Poly_ET(): + assert Poly(0, x).ET() == ((0,), 0) + assert Poly(1, x).ET() == ((0,), 1) + assert Poly(2*x**2 + x, x).ET() == ((1,), 1) + + assert Poly(x*y**7 + 2*x**2*y**3).ET('lex') == ((1, 7), 1) + assert Poly(x*y**7 + 2*x**2*y**3).ET('grlex') == ((2, 3), 2) + + +def test_Poly_max_norm(): + assert Poly(-1, x).max_norm() == 1 + assert Poly( 0, x).max_norm() == 0 + assert Poly( 1, x).max_norm() == 1 + + +def test_Poly_l1_norm(): + assert Poly(-1, x).l1_norm() == 1 + assert Poly( 0, x).l1_norm() == 0 + assert Poly( 1, x).l1_norm() == 1 + + +def test_Poly_clear_denoms(): + coeff, poly = Poly(x + 2, x).clear_denoms() + assert coeff == 1 and poly == Poly( + x + 2, x, domain='ZZ') and poly.get_domain() == ZZ + + coeff, poly = Poly(x/2 + 1, x).clear_denoms() + assert coeff == 2 and poly == Poly( + x + 2, x, domain='QQ') and poly.get_domain() == QQ + + coeff, poly = Poly(2*x**2 + 3, modulus=5).clear_denoms() + assert coeff == 1 and poly == Poly( + 2*x**2 + 3, x, modulus=5) and poly.get_domain() == FF(5) + + coeff, poly = Poly(x/2 + 1, x).clear_denoms(convert=True) + assert coeff == 2 and poly == Poly( + x + 2, x, domain='ZZ') and poly.get_domain() == ZZ + + coeff, poly = Poly(x/y + 1, x).clear_denoms(convert=True) + assert coeff == y and poly == Poly( + x + y, x, domain='ZZ[y]') and poly.get_domain() == ZZ[y] + + coeff, poly = Poly(x/3 + sqrt(2), x, domain='EX').clear_denoms() + assert coeff == 3 and poly == Poly( + x + 3*sqrt(2), x, domain='EX') and poly.get_domain() == EX + + coeff, poly = Poly( + x/3 + sqrt(2), x, domain='EX').clear_denoms(convert=True) + assert coeff == 3 and poly == Poly( + x + 3*sqrt(2), x, domain='EX') and poly.get_domain() == EX + + +def test_Poly_rat_clear_denoms(): + f = Poly(x**2/y + 1, x) + g = Poly(x**3 + y, x) + + assert f.rat_clear_denoms(g) == \ + (Poly(x**2 + y, x), Poly(y*x**3 + y**2, x)) + + f = f.set_domain(EX) + g = g.set_domain(EX) + + assert f.rat_clear_denoms(g) == (f, g) + + +def test_issue_20427(): + f = Poly(-117968192370600*18**(S(1)/3)/(217603955769048*(24201 + + 253*sqrt(9165))**(S(1)/3) + 2273005839412*sqrt(9165)*(24201 + + 253*sqrt(9165))**(S(1)/3)) - 15720318185*2**(S(2)/3)*3**(S(1)/3)*(24201 + + 253*sqrt(9165))**(S(2)/3)/(217603955769048*(24201 + 253*sqrt(9165))** + (S(1)/3) + 2273005839412*sqrt(9165)*(24201 + 253*sqrt(9165))**(S(1)/3)) + + 15720318185*12**(S(1)/3)*(24201 + 253*sqrt(9165))**(S(2)/3)/( + 217603955769048*(24201 + 253*sqrt(9165))**(S(1)/3) + 2273005839412* + sqrt(9165)*(24201 + 253*sqrt(9165))**(S(1)/3)) + 117968192370600*2**( + S(1)/3)*3**(S(2)/3)/(217603955769048*(24201 + 253*sqrt(9165))**(S(1)/3) + + 2273005839412*sqrt(9165)*(24201 + 253*sqrt(9165))**(S(1)/3)), x) + assert f == Poly(0, x, domain='EX') + + +def test_Poly_integrate(): + assert Poly(x + 1).integrate() == Poly(x**2/2 + x) + assert Poly(x + 1).integrate(x) == Poly(x**2/2 + x) + assert Poly(x + 1).integrate((x, 1)) == Poly(x**2/2 + x) + + assert Poly(x*y + 1).integrate(x) == Poly(x**2*y/2 + x) + assert Poly(x*y + 1).integrate(y) == Poly(x*y**2/2 + y) + + assert Poly(x*y + 1).integrate(x, x) == Poly(x**3*y/6 + x**2/2) + assert Poly(x*y + 1).integrate(y, y) == Poly(x*y**3/6 + y**2/2) + + assert Poly(x*y + 1).integrate((x, 2)) == Poly(x**3*y/6 + x**2/2) + assert Poly(x*y + 1).integrate((y, 2)) == Poly(x*y**3/6 + y**2/2) + + assert Poly(x*y + 1).integrate(x, y) == Poly(x**2*y**2/4 + x*y) + assert Poly(x*y + 1).integrate(y, x) == Poly(x**2*y**2/4 + x*y) + + +def test_Poly_diff(): + assert Poly(x**2 + x).diff() == Poly(2*x + 1) + assert Poly(x**2 + x).diff(x) == Poly(2*x + 1) + assert Poly(x**2 + x).diff((x, 1)) == Poly(2*x + 1) + + assert Poly(x**2*y**2 + x*y).diff(x) == Poly(2*x*y**2 + y) + assert Poly(x**2*y**2 + x*y).diff(y) == Poly(2*x**2*y + x) + + assert Poly(x**2*y**2 + x*y).diff(x, x) == Poly(2*y**2, x, y) + assert Poly(x**2*y**2 + x*y).diff(y, y) == Poly(2*x**2, x, y) + + assert Poly(x**2*y**2 + x*y).diff((x, 2)) == Poly(2*y**2, x, y) + assert Poly(x**2*y**2 + x*y).diff((y, 2)) == Poly(2*x**2, x, y) + + assert Poly(x**2*y**2 + x*y).diff(x, y) == Poly(4*x*y + 1) + assert Poly(x**2*y**2 + x*y).diff(y, x) == Poly(4*x*y + 1) + + +def test_issue_9585(): + assert diff(Poly(x**2 + x)) == Poly(2*x + 1) + assert diff(Poly(x**2 + x), x, evaluate=False) == \ + Derivative(Poly(x**2 + x), x) + assert Derivative(Poly(x**2 + x), x).doit() == Poly(2*x + 1) + + +def test_Poly_eval(): + assert Poly(0, x).eval(7) == 0 + assert Poly(1, x).eval(7) == 1 + assert Poly(x, x).eval(7) == 7 + + assert Poly(0, x).eval(0, 7) == 0 + assert Poly(1, x).eval(0, 7) == 1 + assert Poly(x, x).eval(0, 7) == 7 + + assert Poly(0, x).eval(x, 7) == 0 + assert Poly(1, x).eval(x, 7) == 1 + assert Poly(x, x).eval(x, 7) == 7 + + assert Poly(0, x).eval('x', 7) == 0 + assert Poly(1, x).eval('x', 7) == 1 + assert Poly(x, x).eval('x', 7) == 7 + + raises(PolynomialError, lambda: Poly(1, x).eval(1, 7)) + raises(PolynomialError, lambda: Poly(1, x).eval(y, 7)) + raises(PolynomialError, lambda: Poly(1, x).eval('y', 7)) + + assert Poly(123, x, y).eval(7) == Poly(123, y) + assert Poly(2*y, x, y).eval(7) == Poly(2*y, y) + assert Poly(x*y, x, y).eval(7) == Poly(7*y, y) + + assert Poly(123, x, y).eval(x, 7) == Poly(123, y) + assert Poly(2*y, x, y).eval(x, 7) == Poly(2*y, y) + assert Poly(x*y, x, y).eval(x, 7) == Poly(7*y, y) + + assert Poly(123, x, y).eval(y, 7) == Poly(123, x) + assert Poly(2*y, x, y).eval(y, 7) == Poly(14, x) + assert Poly(x*y, x, y).eval(y, 7) == Poly(7*x, x) + + assert Poly(x*y + y, x, y).eval({x: 7}) == Poly(8*y, y) + assert Poly(x*y + y, x, y).eval({y: 7}) == Poly(7*x + 7, x) + + assert Poly(x*y + y, x, y).eval({x: 6, y: 7}) == 49 + assert Poly(x*y + y, x, y).eval({x: 7, y: 6}) == 48 + + assert Poly(x*y + y, x, y).eval((6, 7)) == 49 + assert Poly(x*y + y, x, y).eval([6, 7]) == 49 + + assert Poly(x + 1, domain='ZZ').eval(S.Half) == Rational(3, 2) + assert Poly(x + 1, domain='ZZ').eval(sqrt(2)) == sqrt(2) + 1 + + raises(ValueError, lambda: Poly(x*y + y, x, y).eval((6, 7, 8))) + raises(DomainError, lambda: Poly(x + 1, domain='ZZ').eval(S.Half, auto=False)) + + # issue 6344 + alpha = Symbol('alpha') + result = (2*alpha*z - 2*alpha + z**2 + 3)/(z**2 - 2*z + 1) + + f = Poly(x**2 + (alpha - 1)*x - alpha + 1, x, domain='ZZ[alpha]') + assert f.eval((z + 1)/(z - 1)) == result + + g = Poly(x**2 + (alpha - 1)*x - alpha + 1, x, y, domain='ZZ[alpha]') + assert g.eval((z + 1)/(z - 1)) == Poly(result, y, domain='ZZ(alpha,z)') + +def test_Poly___call__(): + f = Poly(2*x*y + 3*x + y + 2*z) + + assert f(2) == Poly(5*y + 2*z + 6) + assert f(2, 5) == Poly(2*z + 31) + assert f(2, 5, 7) == 45 + + +def test_parallel_poly_from_expr(): + assert parallel_poly_from_expr( + [x - 1, x**2 - 1], x)[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [Poly(x - 1, x), x**2 - 1], x)[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [x - 1, Poly(x**2 - 1, x)], x)[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr([Poly( + x - 1, x), Poly(x**2 - 1, x)], x)[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + + assert parallel_poly_from_expr( + [x - 1, x**2 - 1], x, y)[0] == [Poly(x - 1, x, y), Poly(x**2 - 1, x, y)] + assert parallel_poly_from_expr([Poly( + x - 1, x), x**2 - 1], x, y)[0] == [Poly(x - 1, x, y), Poly(x**2 - 1, x, y)] + assert parallel_poly_from_expr([x - 1, Poly( + x**2 - 1, x)], x, y)[0] == [Poly(x - 1, x, y), Poly(x**2 - 1, x, y)] + assert parallel_poly_from_expr([Poly(x - 1, x), Poly( + x**2 - 1, x)], x, y)[0] == [Poly(x - 1, x, y), Poly(x**2 - 1, x, y)] + + assert parallel_poly_from_expr( + [x - 1, x**2 - 1])[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [Poly(x - 1, x), x**2 - 1])[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [x - 1, Poly(x**2 - 1, x)])[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [Poly(x - 1, x), Poly(x**2 - 1, x)])[0] == [Poly(x - 1, x), Poly(x**2 - 1, x)] + + assert parallel_poly_from_expr( + [1, x**2 - 1])[0] == [Poly(1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [1, x**2 - 1])[0] == [Poly(1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [1, Poly(x**2 - 1, x)])[0] == [Poly(1, x), Poly(x**2 - 1, x)] + assert parallel_poly_from_expr( + [1, Poly(x**2 - 1, x)])[0] == [Poly(1, x), Poly(x**2 - 1, x)] + + assert parallel_poly_from_expr( + [x**2 - 1, 1])[0] == [Poly(x**2 - 1, x), Poly(1, x)] + assert parallel_poly_from_expr( + [x**2 - 1, 1])[0] == [Poly(x**2 - 1, x), Poly(1, x)] + assert parallel_poly_from_expr( + [Poly(x**2 - 1, x), 1])[0] == [Poly(x**2 - 1, x), Poly(1, x)] + assert parallel_poly_from_expr( + [Poly(x**2 - 1, x), 1])[0] == [Poly(x**2 - 1, x), Poly(1, x)] + + assert parallel_poly_from_expr([Poly(x, x, y), Poly(y, x, y)], x, y, order='lex')[0] == \ + [Poly(x, x, y, domain='ZZ'), Poly(y, x, y, domain='ZZ')] + + raises(PolificationFailed, lambda: parallel_poly_from_expr([0, 1])) + + +def test_pdiv(): + f, g = x**2 - y**2, x - y + q, r = x + y, 0 + + F, G, Q, R = [ Poly(h, x, y) for h in (f, g, q, r) ] + + assert F.pdiv(G) == (Q, R) + assert F.prem(G) == R + assert F.pquo(G) == Q + assert F.pexquo(G) == Q + + assert pdiv(f, g) == (q, r) + assert prem(f, g) == r + assert pquo(f, g) == q + assert pexquo(f, g) == q + + assert pdiv(f, g, x, y) == (q, r) + assert prem(f, g, x, y) == r + assert pquo(f, g, x, y) == q + assert pexquo(f, g, x, y) == q + + assert pdiv(f, g, (x, y)) == (q, r) + assert prem(f, g, (x, y)) == r + assert pquo(f, g, (x, y)) == q + assert pexquo(f, g, (x, y)) == q + + assert pdiv(F, G) == (Q, R) + assert prem(F, G) == R + assert pquo(F, G) == Q + assert pexquo(F, G) == Q + + assert pdiv(f, g, polys=True) == (Q, R) + assert prem(f, g, polys=True) == R + assert pquo(f, g, polys=True) == Q + assert pexquo(f, g, polys=True) == Q + + assert pdiv(F, G, polys=False) == (q, r) + assert prem(F, G, polys=False) == r + assert pquo(F, G, polys=False) == q + assert pexquo(F, G, polys=False) == q + + raises(ComputationFailed, lambda: pdiv(4, 2)) + raises(ComputationFailed, lambda: prem(4, 2)) + raises(ComputationFailed, lambda: pquo(4, 2)) + raises(ComputationFailed, lambda: pexquo(4, 2)) + + +def test_div(): + f, g = x**2 - y**2, x - y + q, r = x + y, 0 + + F, G, Q, R = [ Poly(h, x, y) for h in (f, g, q, r) ] + + assert F.div(G) == (Q, R) + assert F.rem(G) == R + assert F.quo(G) == Q + assert F.exquo(G) == Q + + assert div(f, g) == (q, r) + assert rem(f, g) == r + assert quo(f, g) == q + assert exquo(f, g) == q + + assert div(f, g, x, y) == (q, r) + assert rem(f, g, x, y) == r + assert quo(f, g, x, y) == q + assert exquo(f, g, x, y) == q + + assert div(f, g, (x, y)) == (q, r) + assert rem(f, g, (x, y)) == r + assert quo(f, g, (x, y)) == q + assert exquo(f, g, (x, y)) == q + + assert div(F, G) == (Q, R) + assert rem(F, G) == R + assert quo(F, G) == Q + assert exquo(F, G) == Q + + assert div(f, g, polys=True) == (Q, R) + assert rem(f, g, polys=True) == R + assert quo(f, g, polys=True) == Q + assert exquo(f, g, polys=True) == Q + + assert div(F, G, polys=False) == (q, r) + assert rem(F, G, polys=False) == r + assert quo(F, G, polys=False) == q + assert exquo(F, G, polys=False) == q + + raises(ComputationFailed, lambda: div(4, 2)) + raises(ComputationFailed, lambda: rem(4, 2)) + raises(ComputationFailed, lambda: quo(4, 2)) + raises(ComputationFailed, lambda: exquo(4, 2)) + + f, g = x**2 + 1, 2*x - 4 + + qz, rz = 0, x**2 + 1 + qq, rq = x/2 + 1, 5 + + assert div(f, g) == (qq, rq) + assert div(f, g, auto=True) == (qq, rq) + assert div(f, g, auto=False) == (qz, rz) + assert div(f, g, domain=ZZ) == (qz, rz) + assert div(f, g, domain=QQ) == (qq, rq) + assert div(f, g, domain=ZZ, auto=True) == (qq, rq) + assert div(f, g, domain=ZZ, auto=False) == (qz, rz) + assert div(f, g, domain=QQ, auto=True) == (qq, rq) + assert div(f, g, domain=QQ, auto=False) == (qq, rq) + + assert rem(f, g) == rq + assert rem(f, g, auto=True) == rq + assert rem(f, g, auto=False) == rz + assert rem(f, g, domain=ZZ) == rz + assert rem(f, g, domain=QQ) == rq + assert rem(f, g, domain=ZZ, auto=True) == rq + assert rem(f, g, domain=ZZ, auto=False) == rz + assert rem(f, g, domain=QQ, auto=True) == rq + assert rem(f, g, domain=QQ, auto=False) == rq + + assert quo(f, g) == qq + assert quo(f, g, auto=True) == qq + assert quo(f, g, auto=False) == qz + assert quo(f, g, domain=ZZ) == qz + assert quo(f, g, domain=QQ) == qq + assert quo(f, g, domain=ZZ, auto=True) == qq + assert quo(f, g, domain=ZZ, auto=False) == qz + assert quo(f, g, domain=QQ, auto=True) == qq + assert quo(f, g, domain=QQ, auto=False) == qq + + f, g, q = x**2, 2*x, x/2 + + assert exquo(f, g) == q + assert exquo(f, g, auto=True) == q + raises(ExactQuotientFailed, lambda: exquo(f, g, auto=False)) + raises(ExactQuotientFailed, lambda: exquo(f, g, domain=ZZ)) + assert exquo(f, g, domain=QQ) == q + assert exquo(f, g, domain=ZZ, auto=True) == q + raises(ExactQuotientFailed, lambda: exquo(f, g, domain=ZZ, auto=False)) + assert exquo(f, g, domain=QQ, auto=True) == q + assert exquo(f, g, domain=QQ, auto=False) == q + + f, g = Poly(x**2), Poly(x) + + q, r = f.div(g) + assert q.get_domain().is_ZZ and r.get_domain().is_ZZ + r = f.rem(g) + assert r.get_domain().is_ZZ + q = f.quo(g) + assert q.get_domain().is_ZZ + q = f.exquo(g) + assert q.get_domain().is_ZZ + + f, g = Poly(x+y, x), Poly(2*x+y, x) + q, r = f.div(g) + assert q.get_domain().is_Frac and r.get_domain().is_Frac + + # https://github.com/sympy/sympy/issues/19579 + p = Poly(2+3*I, x, domain=ZZ_I) + q = Poly(1-I, x, domain=ZZ_I) + assert p.div(q, auto=False) == \ + (Poly(0, x, domain='ZZ_I'), Poly(2 + 3*I, x, domain='ZZ_I')) + assert p.div(q, auto=True) == \ + (Poly(-S(1)/2 + 5*I/2, x, domain='QQ_I'), Poly(0, x, domain='QQ_I')) + + f = 5*x**2 + 10*x + 3 + g = 2*x + 2 + assert div(f, g, domain=ZZ) == (0, f) + + +def test_issue_7864(): + q, r = div(a, .408248290463863*a) + assert abs(q - 2.44948974278318) < 1e-14 + assert r == 0 + + +def test_gcdex(): + f, g = 2*x, x**2 - 16 + s, t, h = x/32, Rational(-1, 16), 1 + + F, G, S, T, H = [ Poly(u, x, domain='QQ') for u in (f, g, s, t, h) ] + + assert F.half_gcdex(G) == (S, H) + assert F.gcdex(G) == (S, T, H) + assert F.invert(G) == S + + assert half_gcdex(f, g) == (s, h) + assert gcdex(f, g) == (s, t, h) + assert invert(f, g) == s + + assert half_gcdex(f, g, x) == (s, h) + assert gcdex(f, g, x) == (s, t, h) + assert invert(f, g, x) == s + + assert half_gcdex(f, g, (x,)) == (s, h) + assert gcdex(f, g, (x,)) == (s, t, h) + assert invert(f, g, (x,)) == s + + assert half_gcdex(F, G) == (S, H) + assert gcdex(F, G) == (S, T, H) + assert invert(F, G) == S + + assert half_gcdex(f, g, polys=True) == (S, H) + assert gcdex(f, g, polys=True) == (S, T, H) + assert invert(f, g, polys=True) == S + + assert half_gcdex(F, G, polys=False) == (s, h) + assert gcdex(F, G, polys=False) == (s, t, h) + assert invert(F, G, polys=False) == s + + assert half_gcdex(100, 2004) == (-20, 4) + assert gcdex(100, 2004) == (-20, 1, 4) + assert invert(3, 7) == 5 + + raises(DomainError, lambda: half_gcdex(x + 1, 2*x + 1, auto=False)) + raises(DomainError, lambda: gcdex(x + 1, 2*x + 1, auto=False)) + raises(DomainError, lambda: invert(x + 1, 2*x + 1, auto=False)) + + +def test_revert(): + f = Poly(1 - x**2/2 + x**4/24 - x**6/720) + g = Poly(61*x**6/720 + 5*x**4/24 + x**2/2 + 1) + + assert f.revert(8) == g + + +def test_subresultants(): + f, g, h = x**2 - 2*x + 1, x**2 - 1, 2*x - 2 + F, G, H = Poly(f), Poly(g), Poly(h) + + assert F.subresultants(G) == [F, G, H] + assert subresultants(f, g) == [f, g, h] + assert subresultants(f, g, x) == [f, g, h] + assert subresultants(f, g, (x,)) == [f, g, h] + assert subresultants(F, G) == [F, G, H] + assert subresultants(f, g, polys=True) == [F, G, H] + assert subresultants(F, G, polys=False) == [f, g, h] + + raises(ComputationFailed, lambda: subresultants(4, 2)) + + +def test_resultant(): + f, g, h = x**2 - 2*x + 1, x**2 - 1, 0 + F, G = Poly(f), Poly(g) + + assert F.resultant(G) == h + assert resultant(f, g) == h + assert resultant(f, g, x) == h + assert resultant(f, g, (x,)) == h + assert resultant(F, G) == h + assert resultant(f, g, polys=True) == h + assert resultant(F, G, polys=False) == h + assert resultant(f, g, includePRS=True) == (h, [f, g, 2*x - 2]) + + f, g, h = x - a, x - b, a - b + F, G, H = Poly(f), Poly(g), Poly(h) + + assert F.resultant(G) == H + assert resultant(f, g) == h + assert resultant(f, g, x) == h + assert resultant(f, g, (x,)) == h + assert resultant(F, G) == H + assert resultant(f, g, polys=True) == H + assert resultant(F, G, polys=False) == h + + raises(ComputationFailed, lambda: resultant(4, 2)) + + +def test_discriminant(): + f, g = x**3 + 3*x**2 + 9*x - 13, -11664 + F = Poly(f) + + assert F.discriminant() == g + assert discriminant(f) == g + assert discriminant(f, x) == g + assert discriminant(f, (x,)) == g + assert discriminant(F) == g + assert discriminant(f, polys=True) == g + assert discriminant(F, polys=False) == g + + f, g = a*x**2 + b*x + c, b**2 - 4*a*c + F, G = Poly(f), Poly(g) + + assert F.discriminant() == G + assert discriminant(f) == g + assert discriminant(f, x, a, b, c) == g + assert discriminant(f, (x, a, b, c)) == g + assert discriminant(F) == G + assert discriminant(f, polys=True) == G + assert discriminant(F, polys=False) == g + + raises(ComputationFailed, lambda: discriminant(4)) + + +def test_dispersion(): + # We test only the API here. For more mathematical + # tests see the dedicated test file. + fp = poly((x + 1)*(x + 2), x) + assert sorted(fp.dispersionset()) == [0, 1] + assert fp.dispersion() == 1 + + fp = poly(x**4 - 3*x**2 + 1, x) + gp = fp.shift(-3) + assert sorted(fp.dispersionset(gp)) == [2, 3, 4] + assert fp.dispersion(gp) == 4 + + +def test_gcd_list(): + F = [x**3 - 1, x**2 - 1, x**2 - 3*x + 2] + + assert gcd_list(F) == x - 1 + assert gcd_list(F, polys=True) == Poly(x - 1) + + assert gcd_list([]) == 0 + assert gcd_list([1, 2]) == 1 + assert gcd_list([4, 6, 8]) == 2 + + assert gcd_list([x*(y + 42) - x*y - x*42]) == 0 + + gcd = gcd_list([], x) + assert gcd.is_Number and gcd is S.Zero + + gcd = gcd_list([], x, polys=True) + assert gcd.is_Poly and gcd.is_zero + + a = sqrt(2) + assert gcd_list([a, -a]) == gcd_list([-a, a]) == a + + raises(ComputationFailed, lambda: gcd_list([], polys=True)) + + +def test_lcm_list(): + F = [x**3 - 1, x**2 - 1, x**2 - 3*x + 2] + + assert lcm_list(F) == x**5 - x**4 - 2*x**3 - x**2 + x + 2 + assert lcm_list(F, polys=True) == Poly(x**5 - x**4 - 2*x**3 - x**2 + x + 2) + + assert lcm_list([]) == 1 + assert lcm_list([1, 2]) == 2 + assert lcm_list([4, 6, 8]) == 24 + + assert lcm_list([x*(y + 42) - x*y - x*42]) == 0 + + lcm = lcm_list([], x) + assert lcm.is_Number and lcm is S.One + + lcm = lcm_list([], x, polys=True) + assert lcm.is_Poly and lcm.is_one + + raises(ComputationFailed, lambda: lcm_list([], polys=True)) + + +def test_gcd(): + f, g = x**3 - 1, x**2 - 1 + s, t = x**2 + x + 1, x + 1 + h, r = x - 1, x**4 + x**3 - x - 1 + + F, G, S, T, H, R = [ Poly(u) for u in (f, g, s, t, h, r) ] + + assert F.cofactors(G) == (H, S, T) + assert F.gcd(G) == H + assert F.lcm(G) == R + + assert cofactors(f, g) == (h, s, t) + assert gcd(f, g) == h + assert lcm(f, g) == r + + assert cofactors(f, g, x) == (h, s, t) + assert gcd(f, g, x) == h + assert lcm(f, g, x) == r + + assert cofactors(f, g, (x,)) == (h, s, t) + assert gcd(f, g, (x,)) == h + assert lcm(f, g, (x,)) == r + + assert cofactors(F, G) == (H, S, T) + assert gcd(F, G) == H + assert lcm(F, G) == R + + assert cofactors(f, g, polys=True) == (H, S, T) + assert gcd(f, g, polys=True) == H + assert lcm(f, g, polys=True) == R + + assert cofactors(F, G, polys=False) == (h, s, t) + assert gcd(F, G, polys=False) == h + assert lcm(F, G, polys=False) == r + + f, g = 1.0*x**2 - 1.0, 1.0*x - 1.0 + h, s, t = g, 1.0*x + 1.0, 1.0 + + assert cofactors(f, g) == (h, s, t) + assert gcd(f, g) == h + assert lcm(f, g) == f + + f, g = 1.0*x**2 - 1.0, 1.0*x - 1.0 + h, s, t = g, 1.0*x + 1.0, 1.0 + + assert cofactors(f, g) == (h, s, t) + assert gcd(f, g) == h + assert lcm(f, g) == f + + assert cofactors(8, 6) == (2, 4, 3) + assert gcd(8, 6) == 2 + assert lcm(8, 6) == 24 + + f, g = x**2 - 3*x - 4, x**3 - 4*x**2 + x - 4 + l = x**4 - 3*x**3 - 3*x**2 - 3*x - 4 + h, s, t = x - 4, x + 1, x**2 + 1 + + assert cofactors(f, g, modulus=11) == (h, s, t) + assert gcd(f, g, modulus=11) == h + assert lcm(f, g, modulus=11) == l + + f, g = x**2 + 8*x + 7, x**3 + 7*x**2 + x + 7 + l = x**4 + 8*x**3 + 8*x**2 + 8*x + 7 + h, s, t = x + 7, x + 1, x**2 + 1 + + assert cofactors(f, g, modulus=11, symmetric=False) == (h, s, t) + assert gcd(f, g, modulus=11, symmetric=False) == h + assert lcm(f, g, modulus=11, symmetric=False) == l + + a, b = sqrt(2), -sqrt(2) + assert gcd(a, b) == gcd(b, a) == sqrt(2) + + a, b = sqrt(-2), -sqrt(-2) + assert gcd(a, b) == gcd(b, a) == sqrt(2) + + assert gcd(Poly(x - 2, x), Poly(I*x, x)) == Poly(1, x, domain=ZZ_I) + + raises(TypeError, lambda: gcd(x)) + raises(TypeError, lambda: lcm(x)) + + f = Poly(-1, x) + g = Poly(1, x) + assert lcm(f, g) == Poly(1, x) + + f = Poly(0, x) + g = Poly([1, 1], x) + for i in (f, g): + assert lcm(i, 0) == 0 + assert lcm(0, i) == 0 + assert lcm(i, f) == 0 + assert lcm(f, i) == 0 + + f = 4*x**2 + x + 2 + pfz = Poly(f, domain=ZZ) + pfq = Poly(f, domain=QQ) + + assert pfz.gcd(pfz) == pfz + assert pfz.lcm(pfz) == pfz + assert pfq.gcd(pfq) == pfq.monic() + assert pfq.lcm(pfq) == pfq.monic() + assert gcd(f, f) == f + assert lcm(f, f) == f + assert gcd(f, f, domain=QQ) == monic(f) + assert lcm(f, f, domain=QQ) == monic(f) + + +def test_gcd_numbers_vs_polys(): + assert isinstance(gcd(3, 9), Integer) + assert isinstance(gcd(3*x, 9), Integer) + + assert gcd(3, 9) == 3 + assert gcd(3*x, 9) == 3 + + assert isinstance(gcd(Rational(3, 2), Rational(9, 4)), Rational) + assert isinstance(gcd(Rational(3, 2)*x, Rational(9, 4)), Rational) + + assert gcd(Rational(3, 2), Rational(9, 4)) == Rational(3, 4) + assert gcd(Rational(3, 2)*x, Rational(9, 4)) == 1 + + assert isinstance(gcd(3.0, 9.0), Float) + assert isinstance(gcd(3.0*x, 9.0), Float) + + assert gcd(3.0, 9.0) == 1.0 + assert gcd(3.0*x, 9.0) == 1.0 + + # partial fix of 20597 + assert gcd(Mul(2, 3, evaluate=False), 2) == 2 + + +def test_terms_gcd(): + assert terms_gcd(1) == 1 + assert terms_gcd(1, x) == 1 + + assert terms_gcd(x - 1) == x - 1 + assert terms_gcd(-x - 1) == -x - 1 + + assert terms_gcd(2*x + 3) == 2*x + 3 + assert terms_gcd(6*x + 4) == Mul(2, 3*x + 2, evaluate=False) + + assert terms_gcd(x**3*y + x*y**3) == x*y*(x**2 + y**2) + assert terms_gcd(2*x**3*y + 2*x*y**3) == 2*x*y*(x**2 + y**2) + assert terms_gcd(x**3*y/2 + x*y**3/2) == x*y/2*(x**2 + y**2) + + assert terms_gcd(x**3*y + 2*x*y**3) == x*y*(x**2 + 2*y**2) + assert terms_gcd(2*x**3*y + 4*x*y**3) == 2*x*y*(x**2 + 2*y**2) + assert terms_gcd(2*x**3*y/3 + 4*x*y**3/5) == x*y*Rational(2, 15)*(5*x**2 + 6*y**2) + + assert terms_gcd(2.0*x**3*y + 4.1*x*y**3) == x*y*(2.0*x**2 + 4.1*y**2) + assert _aresame(terms_gcd(2.0*x + 3), 2.0*x + 3) + + assert terms_gcd((3 + 3*x)*(x + x*y), expand=False) == \ + (3*x + 3)*(x*y + x) + assert terms_gcd((3 + 3*x)*(x + x*sin(3 + 3*y)), expand=False, deep=True) == \ + 3*x*(x + 1)*(sin(Mul(3, y + 1, evaluate=False)) + 1) + assert terms_gcd(sin(x + x*y), deep=True) == \ + sin(x*(y + 1)) + + eq = Eq(2*x, 2*y + 2*z*y) + assert terms_gcd(eq) == Eq(2*x, 2*y*(z + 1)) + assert terms_gcd(eq, deep=True) == Eq(2*x, 2*y*(z + 1)) + + raises(TypeError, lambda: terms_gcd(x < 2)) + + +def test_trunc(): + f, g = x**5 + 2*x**4 + 3*x**3 + 4*x**2 + 5*x + 6, x**5 - x**4 + x**2 - x + F, G = Poly(f), Poly(g) + + assert F.trunc(3) == G + assert trunc(f, 3) == g + assert trunc(f, 3, x) == g + assert trunc(f, 3, (x,)) == g + assert trunc(F, 3) == G + assert trunc(f, 3, polys=True) == G + assert trunc(F, 3, polys=False) == g + + f, g = 6*x**5 + 5*x**4 + 4*x**3 + 3*x**2 + 2*x + 1, -x**4 + x**3 - x + 1 + F, G = Poly(f), Poly(g) + + assert F.trunc(3) == G + assert trunc(f, 3) == g + assert trunc(f, 3, x) == g + assert trunc(f, 3, (x,)) == g + assert trunc(F, 3) == G + assert trunc(f, 3, polys=True) == G + assert trunc(F, 3, polys=False) == g + + f = Poly(x**2 + 2*x + 3, modulus=5) + + assert f.trunc(2) == Poly(x**2 + 1, modulus=5) + + +def test_monic(): + f, g = 2*x - 1, x - S.Half + F, G = Poly(f, domain='QQ'), Poly(g) + + assert F.monic() == G + assert monic(f) == g + assert monic(f, x) == g + assert monic(f, (x,)) == g + assert monic(F) == G + assert monic(f, polys=True) == G + assert monic(F, polys=False) == g + + raises(ComputationFailed, lambda: monic(4)) + + assert monic(2*x**2 + 6*x + 4, auto=False) == x**2 + 3*x + 2 + raises(ExactQuotientFailed, lambda: monic(2*x + 6*x + 1, auto=False)) + + assert monic(2.0*x**2 + 6.0*x + 4.0) == 1.0*x**2 + 3.0*x + 2.0 + assert monic(2*x**2 + 3*x + 4, modulus=5) == x**2 - x + 2 + + +def test_content(): + f, F = 4*x + 2, Poly(4*x + 2) + + assert F.content() == 2 + assert content(f) == 2 + + raises(ComputationFailed, lambda: content(4)) + + f = Poly(2*x, modulus=3) + + assert f.content() == 1 + + +def test_primitive(): + f, g = 4*x + 2, 2*x + 1 + F, G = Poly(f), Poly(g) + + assert F.primitive() == (2, G) + assert primitive(f) == (2, g) + assert primitive(f, x) == (2, g) + assert primitive(f, (x,)) == (2, g) + assert primitive(F) == (2, G) + assert primitive(f, polys=True) == (2, G) + assert primitive(F, polys=False) == (2, g) + + raises(ComputationFailed, lambda: primitive(4)) + + f = Poly(2*x, modulus=3) + g = Poly(2.0*x, domain=RR) + + assert f.primitive() == (1, f) + assert g.primitive() == (1.0, g) + + assert primitive(S('-3*x/4 + y + 11/8')) == \ + S('(1/8, -6*x + 8*y + 11)') + + +def test_compose(): + f = x**12 + 20*x**10 + 150*x**8 + 500*x**6 + 625*x**4 - 2*x**3 - 10*x + 9 + g = x**4 - 2*x + 9 + h = x**3 + 5*x + + F, G, H = map(Poly, (f, g, h)) + + assert G.compose(H) == F + assert compose(g, h) == f + assert compose(g, h, x) == f + assert compose(g, h, (x,)) == f + assert compose(G, H) == F + assert compose(g, h, polys=True) == F + assert compose(G, H, polys=False) == f + + assert F.decompose() == [G, H] + assert decompose(f) == [g, h] + assert decompose(f, x) == [g, h] + assert decompose(f, (x,)) == [g, h] + assert decompose(F) == [G, H] + assert decompose(f, polys=True) == [G, H] + assert decompose(F, polys=False) == [g, h] + + raises(ComputationFailed, lambda: compose(4, 2)) + raises(ComputationFailed, lambda: decompose(4)) + + assert compose(x**2 - y**2, x - y, x, y) == x**2 - 2*x*y + assert compose(x**2 - y**2, x - y, y, x) == -y**2 + 2*x*y + + +def test_shift(): + assert Poly(x**2 - 2*x + 1, x).shift(2) == Poly(x**2 + 2*x + 1, x) + + +def test_shift_list(): + assert Poly(x*y, [x,y]).shift_list([1,2]) == Poly((x+1)*(y+2), [x,y]) + + +def test_transform(): + # Also test that 3-way unification is done correctly + assert Poly(x**2 - 2*x + 1, x).transform(Poly(x + 1), Poly(x - 1)) == \ + Poly(4, x) == \ + cancel((x - 1)**2*(x**2 - 2*x + 1).subs(x, (x + 1)/(x - 1))) + + assert Poly(x**2 - x/2 + 1, x).transform(Poly(x + 1), Poly(x - 1)) == \ + Poly(3*x**2/2 + Rational(5, 2), x) == \ + cancel((x - 1)**2*(x**2 - x/2 + 1).subs(x, (x + 1)/(x - 1))) + + assert Poly(x**2 - 2*x + 1, x).transform(Poly(x + S.Half), Poly(x - 1)) == \ + Poly(Rational(9, 4), x) == \ + cancel((x - 1)**2*(x**2 - 2*x + 1).subs(x, (x + S.Half)/(x - 1))) + + assert Poly(x**2 - 2*x + 1, x).transform(Poly(x + 1), Poly(x - S.Half)) == \ + Poly(Rational(9, 4), x) == \ + cancel((x - S.Half)**2*(x**2 - 2*x + 1).subs(x, (x + 1)/(x - S.Half))) + + # Unify ZZ, QQ, and RR + assert Poly(x**2 - 2*x + 1, x).transform(Poly(x + 1.0), Poly(x - S.Half)) == \ + Poly(Rational(9, 4), x, domain='RR') == \ + cancel((x - S.Half)**2*(x**2 - 2*x + 1).subs(x, (x + 1.0)/(x - S.Half))) + + raises(ValueError, lambda: Poly(x*y).transform(Poly(x + 1), Poly(x - 1))) + raises(ValueError, lambda: Poly(x).transform(Poly(y + 1), Poly(x - 1))) + raises(ValueError, lambda: Poly(x).transform(Poly(x + 1), Poly(y - 1))) + raises(ValueError, lambda: Poly(x).transform(Poly(x*y + 1), Poly(x - 1))) + raises(ValueError, lambda: Poly(x).transform(Poly(x + 1), Poly(x*y - 1))) + + +def test_sturm(): + f, F = x, Poly(x, domain='QQ') + g, G = 1, Poly(1, x, domain='QQ') + + assert F.sturm() == [F, G] + assert sturm(f) == [f, g] + assert sturm(f, x) == [f, g] + assert sturm(f, (x,)) == [f, g] + assert sturm(F) == [F, G] + assert sturm(f, polys=True) == [F, G] + assert sturm(F, polys=False) == [f, g] + + raises(ComputationFailed, lambda: sturm(4)) + raises(DomainError, lambda: sturm(f, auto=False)) + + f = Poly(S(1024)/(15625*pi**8)*x**5 + - S(4096)/(625*pi**8)*x**4 + + S(32)/(15625*pi**4)*x**3 + - S(128)/(625*pi**4)*x**2 + + Rational(1, 62500)*x + - Rational(1, 625), x, domain='ZZ(pi)') + + assert sturm(f) == \ + [Poly(x**3 - 100*x**2 + pi**4/64*x - 25*pi**4/16, x, domain='ZZ(pi)'), + Poly(3*x**2 - 200*x + pi**4/64, x, domain='ZZ(pi)'), + Poly((Rational(20000, 9) - pi**4/96)*x + 25*pi**4/18, x, domain='ZZ(pi)'), + Poly((-3686400000000*pi**4 - 11520000*pi**8 - 9*pi**12)/(26214400000000 - 245760000*pi**4 + 576*pi**8), x, domain='ZZ(pi)')] + + +def test_gff(): + f = x**5 + 2*x**4 - x**3 - 2*x**2 + + assert Poly(f).gff_list() == [(Poly(x), 1), (Poly(x + 2), 4)] + assert gff_list(f) == [(x, 1), (x + 2, 4)] + + raises(NotImplementedError, lambda: gff(f)) + + f = x*(x - 1)**3*(x - 2)**2*(x - 4)**2*(x - 5) + + assert Poly(f).gff_list() == [( + Poly(x**2 - 5*x + 4), 1), (Poly(x**2 - 5*x + 4), 2), (Poly(x), 3)] + assert gff_list(f) == [(x**2 - 5*x + 4, 1), (x**2 - 5*x + 4, 2), (x, 3)] + + raises(NotImplementedError, lambda: gff(f)) + + +def test_norm(): + a, b = sqrt(2), sqrt(3) + f = Poly(a*x + b*y, x, y, extension=(a, b)) + assert f.norm() == Poly(4*x**4 - 12*x**2*y**2 + 9*y**4, x, y, domain='QQ') + + +def test_sqf_norm(): + assert sqf_norm(x**2 - 2, extension=sqrt(3)) == \ + ([1], x**2 - 2*sqrt(3)*x + 1, x**4 - 10*x**2 + 1) + assert sqf_norm(x**2 - 3, extension=sqrt(2)) == \ + ([1], x**2 - 2*sqrt(2)*x - 1, x**4 - 10*x**2 + 1) + + assert Poly(x**2 - 2, extension=sqrt(3)).sqf_norm() == \ + ([1], Poly(x**2 - 2*sqrt(3)*x + 1, x, extension=sqrt(3)), + Poly(x**4 - 10*x**2 + 1, x, domain='QQ')) + + assert Poly(x**2 - 3, extension=sqrt(2)).sqf_norm() == \ + ([1], Poly(x**2 - 2*sqrt(2)*x - 1, x, extension=sqrt(2)), + Poly(x**4 - 10*x**2 + 1, x, domain='QQ')) + + +def test_sqf(): + f = x**5 - x**3 - x**2 + 1 + g = x**3 + 2*x**2 + 2*x + 1 + h = x - 1 + + p = x**4 + x**3 - x - 1 + + F, G, H, P = map(Poly, (f, g, h, p)) + + assert F.sqf_part() == P + assert sqf_part(f) == p + assert sqf_part(f, x) == p + assert sqf_part(f, (x,)) == p + assert sqf_part(F) == P + assert sqf_part(f, polys=True) == P + assert sqf_part(F, polys=False) == p + + assert F.sqf_list() == (1, [(G, 1), (H, 2)]) + assert sqf_list(f) == (1, [(g, 1), (h, 2)]) + assert sqf_list(f, x) == (1, [(g, 1), (h, 2)]) + assert sqf_list(f, (x,)) == (1, [(g, 1), (h, 2)]) + assert sqf_list(F) == (1, [(G, 1), (H, 2)]) + assert sqf_list(f, polys=True) == (1, [(G, 1), (H, 2)]) + assert sqf_list(F, polys=False) == (1, [(g, 1), (h, 2)]) + + assert F.sqf_list_include() == [(G, 1), (H, 2)] + + raises(ComputationFailed, lambda: sqf_part(4)) + + assert sqf(1) == 1 + assert sqf_list(1) == (1, []) + + assert sqf((2*x**2 + 2)**7) == 128*(x**2 + 1)**7 + + assert sqf(f) == g*h**2 + assert sqf(f, x) == g*h**2 + assert sqf(f, (x,)) == g*h**2 + + d = x**2 + y**2 + + assert sqf(f/d) == (g*h**2)/d + assert sqf(f/d, x) == (g*h**2)/d + assert sqf(f/d, (x,)) == (g*h**2)/d + + assert sqf(x - 1) == x - 1 + assert sqf(-x - 1) == -x - 1 + + assert sqf(x - 1) == x - 1 + assert sqf(6*x - 10) == Mul(2, 3*x - 5, evaluate=False) + + assert sqf((6*x - 10)/(3*x - 6)) == Rational(2, 3)*((3*x - 5)/(x - 2)) + assert sqf(Poly(x**2 - 2*x + 1)) == (x - 1)**2 + + f = 3 + x - x*(1 + x) + x**2 + + assert sqf(f) == 3 + + f = (x**2 + 2*x + 1)**20000000000 + + assert sqf(f) == (x + 1)**40000000000 + assert sqf_list(f) == (1, [(x + 1, 40000000000)]) + + # https://github.com/sympy/sympy/issues/26497 + assert sqf(expand(((y - 2)**2 * (y + 2) * (x + 1)))) == \ + (y - 2)**2 * expand((y + 2) * (x + 1)) + assert sqf(expand(((y - 2)**2 * (y + 2) * (z + 1)))) == \ + (y - 2)**2 * expand((y + 2) * (z + 1)) + assert sqf(expand(((y - I)**2 * (y + I) * (x + 1)))) == \ + (y - I)**2 * expand((y + I) * (x + 1)) + assert sqf(expand(((y - I)**2 * (y + I) * (z + 1)))) == \ + (y - I)**2 * expand((y + I) * (z + 1)) + + # Check that factors are combined and sorted. + p = (x - 2)**2*(x - 1)*(x + y)**2*(y - 2)**2*(y - 1) + assert Poly(p).sqf_list() == (1, [ + (Poly(x*y - x - y + 1), 1), + (Poly(x**2*y - 2*x**2 + x*y**2 - 4*x*y + 4*x - 2*y**2 + 4*y), 2) + ]) + + +def test_factor(): + f = x**5 - x**3 - x**2 + 1 + + u = x + 1 + v = x - 1 + w = x**2 + x + 1 + + F, U, V, W = map(Poly, (f, u, v, w)) + + assert F.factor_list() == (1, [(U, 1), (V, 2), (W, 1)]) + assert factor_list(f) == (1, [(u, 1), (v, 2), (w, 1)]) + assert factor_list(f, x) == (1, [(u, 1), (v, 2), (w, 1)]) + assert factor_list(f, (x,)) == (1, [(u, 1), (v, 2), (w, 1)]) + assert factor_list(F) == (1, [(U, 1), (V, 2), (W, 1)]) + assert factor_list(f, polys=True) == (1, [(U, 1), (V, 2), (W, 1)]) + assert factor_list(F, polys=False) == (1, [(u, 1), (v, 2), (w, 1)]) + + assert F.factor_list_include() == [(U, 1), (V, 2), (W, 1)] + + assert factor_list(1) == (1, []) + assert factor_list(6) == (6, []) + assert factor_list(sqrt(3), x) == (sqrt(3), []) + assert factor_list((-1)**x, x) == (1, [(-1, x)]) + assert factor_list((2*x)**y, x) == (1, [(2, y), (x, y)]) + assert factor_list(sqrt(x*y), x) == (1, [(x*y, S.Half)]) + + assert factor(6) == 6 and factor(6).is_Integer + + assert factor_list(3*x) == (3, [(x, 1)]) + assert factor_list(3*x**2) == (3, [(x, 2)]) + + assert factor(3*x) == 3*x + assert factor(3*x**2) == 3*x**2 + + assert factor((2*x**2 + 2)**7) == 128*(x**2 + 1)**7 + + assert factor(f) == u*v**2*w + assert factor(f, x) == u*v**2*w + assert factor(f, (x,)) == u*v**2*w + + g, p, q, r = x**2 - y**2, x - y, x + y, x**2 + 1 + + assert factor(f/g) == (u*v**2*w)/(p*q) + assert factor(f/g, x) == (u*v**2*w)/(p*q) + assert factor(f/g, (x,)) == (u*v**2*w)/(p*q) + + p = Symbol('p', positive=True) + i = Symbol('i', integer=True) + r = Symbol('r', real=True) + + assert factor(sqrt(x*y)).is_Pow is True + + assert factor(sqrt(3*x**2 - 3)) == sqrt(3)*sqrt((x - 1)*(x + 1)) + assert factor(sqrt(3*x**2 + 3)) == sqrt(3)*sqrt(x**2 + 1) + + assert factor((y*x**2 - y)**i) == y**i*(x - 1)**i*(x + 1)**i + assert factor((y*x**2 + y)**i) == y**i*(x**2 + 1)**i + + assert factor((y*x**2 - y)**t) == (y*(x - 1)*(x + 1))**t + assert factor((y*x**2 + y)**t) == (y*(x**2 + 1))**t + + f = sqrt(expand((r**2 + 1)*(p + 1)*(p - 1)*(p - 2)**3)) + g = sqrt((p - 2)**3*(p - 1))*sqrt(p + 1)*sqrt(r**2 + 1) + + assert factor(f) == g + assert factor(g) == g + + g = (x - 1)**5*(r**2 + 1) + f = sqrt(expand(g)) + + assert factor(f) == sqrt(g) + + f = Poly(sin(1)*x + 1, x, domain=EX) + + assert f.factor_list() == (1, [(f, 1)]) + + f = x**4 + 1 + + assert factor(f) == f + assert factor(f, extension=I) == (x**2 - I)*(x**2 + I) + assert factor(f, gaussian=True) == (x**2 - I)*(x**2 + I) + assert factor( + f, extension=sqrt(2)) == (x**2 + sqrt(2)*x + 1)*(x**2 - sqrt(2)*x + 1) + + assert factor(x**2 + 4*I*x - 4) == (x + 2*I)**2 + + f = x**2 + 2*I*x - 4 + + assert factor(f) == f + + f = 8192*x**2 + x*(22656 + 175232*I) - 921416 + 242313*I + f_zzi = I*(x*(64 - 64*I) + 773 + 596*I)**2 + f_qqi = 8192*(x + S(177)/128 + 1369*I/128)**2 + + assert factor(f) == f_zzi + assert factor(f, domain=ZZ_I) == f_zzi + assert factor(f, domain=QQ_I) == f_qqi + + f = x**2 + 2*sqrt(2)*x + 2 + + assert factor(f, extension=sqrt(2)) == (x + sqrt(2))**2 + assert factor(f**3, extension=sqrt(2)) == (x + sqrt(2))**6 + + assert factor(x**2 - 2*y**2, extension=sqrt(2)) == \ + (x + sqrt(2)*y)*(x - sqrt(2)*y) + assert factor(2*x**2 - 4*y**2, extension=sqrt(2)) == \ + 2*((x + sqrt(2)*y)*(x - sqrt(2)*y)) + + assert factor(x - 1) == x - 1 + assert factor(-x - 1) == -x - 1 + + assert factor(x - 1) == x - 1 + + assert factor(6*x - 10) == Mul(2, 3*x - 5, evaluate=False) + + assert factor(x**11 + x + 1, modulus=65537, symmetric=True) == \ + (x**2 + x + 1)*(x**9 - x**8 + x**6 - x**5 + x**3 - x** 2 + 1) + assert factor(x**11 + x + 1, modulus=65537, symmetric=False) == \ + (x**2 + x + 1)*(x**9 + 65536*x**8 + x**6 + 65536*x**5 + + x**3 + 65536*x** 2 + 1) + + f = x/pi + x*sin(x)/pi + g = y/(pi**2 + 2*pi + 1) + y*sin(x)/(pi**2 + 2*pi + 1) + + assert factor(f) == x*(sin(x) + 1)/pi + assert factor(g) == y*(sin(x) + 1)/(pi + 1)**2 + + assert factor(Eq( + x**2 + 2*x + 1, x**3 + 1)) == Eq((x + 1)**2, (x + 1)*(x**2 - x + 1)) + + f = (x**2 - 1)/(x**2 + 4*x + 4) + + assert factor(f) == (x + 1)*(x - 1)/(x + 2)**2 + assert factor(f, x) == (x + 1)*(x - 1)/(x + 2)**2 + + f = 3 + x - x*(1 + x) + x**2 + + assert factor(f) == 3 + assert factor(f, x) == 3 + + assert factor(1/(x**2 + 2*x + 1/x) - 1) == -((1 - x + 2*x**2 + + x**3)/(1 + 2*x**2 + x**3)) + + assert factor(f, expand=False) == f + raises(PolynomialError, lambda: factor(f, x, expand=False)) + + raises(FlagError, lambda: factor(x**2 - 1, polys=True)) + + assert factor([x, Eq(x**2 - y**2, Tuple(x**2 - z**2, 1/x + 1/y))]) == \ + [x, Eq((x - y)*(x + y), Tuple((x - z)*(x + z), (x + y)/x/y))] + + assert not isinstance( + Poly(x**3 + x + 1).factor_list()[1][0][0], PurePoly) is True + assert isinstance( + PurePoly(x**3 + x + 1).factor_list()[1][0][0], PurePoly) is True + + assert factor(sqrt(-x)) == sqrt(-x) + + # issue 5917 + e = (-2*x*(-x + 1)*(x - 1)*(-x*(-x + 1)*(x - 1) - x*(x - 1)**2)*(x**2*(x - + 1) - x*(x - 1) - x) - (-2*x**2*(x - 1)**2 - x*(-x + 1)*(-x*(-x + 1) + + x*(x - 1)))*(x**2*(x - 1)**4 - x*(-x*(-x + 1)*(x - 1) - x*(x - 1)**2))) + assert factor(e) == 0 + + # deep option + assert factor(sin(x**2 + x) + x, deep=True) == sin(x*(x + 1)) + x + assert factor(sin(x**2 + x)*x, deep=True) == sin(x*(x + 1))*x + + assert factor(sqrt(x**2)) == sqrt(x**2) + + # issue 13149 + assert factor(expand((0.5*x+1)*(0.5*y+1))) == Mul(1.0, 0.5*x + 1.0, + 0.5*y + 1.0, evaluate = False) + assert factor(expand((0.5*x+0.5)**2)) == 0.25*(1.0*x + 1.0)**2 + + eq = x**2*y**2 + 11*x**2*y + 30*x**2 + 7*x*y**2 + 77*x*y + 210*x + 12*y**2 + 132*y + 360 + assert factor(eq, x) == (x + 3)*(x + 4)*(y**2 + 11*y + 30) + assert factor(eq, x, deep=True) == (x + 3)*(x + 4)*(y**2 + 11*y + 30) + assert factor(eq, y, deep=True) == (y + 5)*(y + 6)*(x**2 + 7*x + 12) + + # fraction option + f = 5*x + 3*exp(2 - 7*x) + assert factor(f, deep=True) == factor(f, deep=True, fraction=True) + assert factor(f, deep=True, fraction=False) == 5*x + 3*exp(2)*exp(-7*x) + + assert factor_list(x**3 - x*y**2, t, w, x) == ( + 1, [(x, 1), (x - y, 1), (x + y, 1)]) + assert factor_list((x+1)*(x**6-1)) == ( + 1, [(x - 1, 1), (x + 1, 2), (x**2 - x + 1, 1), (x**2 + x + 1, 1)]) + + # https://github.com/sympy/sympy/issues/24952 + s2, s2p, s2n = sqrt(2), 1 + sqrt(2), 1 - sqrt(2) + pip, pin = 1 + pi, 1 - pi + assert factor_list(s2p*s2n) == (-1, [(-s2n, 1), (s2p, 1)]) + assert factor_list(pip*pin) == (-1, [(-pin, 1), (pip, 1)]) + # Not sure about this one. Maybe coeff should be 1 or -1? + assert factor_list(s2*s2n) == (-s2, [(-s2n, 1)]) + assert factor_list(pi*pin) == (-1, [(-pin, 1), (pi, 1)]) + assert factor_list(s2p*s2n, x) == (s2p*s2n, []) + assert factor_list(pip*pin, x) == (pip*pin, []) + assert factor_list(s2*s2n, x) == (s2*s2n, []) + assert factor_list(pi*pin, x) == (pi*pin, []) + assert factor_list((x - sqrt(2)*pi)*(x + sqrt(2)*pi), x) == ( + 1, [(x - sqrt(2)*pi, 1), (x + sqrt(2)*pi, 1)]) + + # https://github.com/sympy/sympy/issues/26497 + p = ((y - I)**2 * (y + I) * (x + 1)) + assert factor(expand(p)) == p + + p = ((x - I)**2 * (x + I) * (y + 1)) + assert factor(expand(p)) == p + + p = (y + 1)**2*(y + sqrt(2))**2*(x**2 + x + 2 + 3*sqrt(2))**2 + assert factor(expand(p), extension=True) == p + + e = ( + -x**2*y**4/(y**2 + 1) + 2*I*x**2*y**3/(y**2 + 1) + 2*I*x**2*y/(y**2 + 1) + + x**2/(y**2 + 1) - 2*x*y**4/(y**2 + 1) + 4*I*x*y**3/(y**2 + 1) + + 4*I*x*y/(y**2 + 1) + 2*x/(y**2 + 1) - y**4 - y**4/(y**2 + 1) + 2*I*y**3 + + 2*I*y**3/(y**2 + 1) + 2*I*y + 2*I*y/(y**2 + 1) + 1 + 1/(y**2 + 1) + ) + assert factor(e) == -(y - I)**3*(y + I)*(x**2 + 2*x + y**2 + 2)/(y**2 + 1) + + # issue 27506 + e = (I*t*x*y - 3*I*t - I*x*y*z - 6*x*y + 3*I*z + 18) + assert factor(e) == -I*(x*y - 3)*(-t + z - 6*I) + + e = (8*x**2*z**2 - 32*x**2*z*t + 24*x**2*t**2 - 4*I*x*y*z**2 + 16*I*x*y*z*t - + 12*I*x*y*t**2 + z**4 - 8*z**3*t + 22*z**2*t**2 - 24*z*t**3 + 9*t**4) + assert factor(e) == (-3*t + z)*(-t + z)*(3*t**2 - 4*t*z + 8*x**2 - 4*I*x*y + z**2) + + +def test_factor_large(): + f = (x**2 + 4*x + 4)**10000000*(x**2 + 1)*(x**2 + 2*x + 1)**1234567 + g = ((x**2 + 2*x + 1)**3000*y**2 + (x**2 + 2*x + 1)**3000*2*y + ( + x**2 + 2*x + 1)**3000) + + assert factor(f) == (x + 2)**20000000*(x**2 + 1)*(x + 1)**2469134 + assert factor(g) == (x + 1)**6000*(y + 1)**2 + + assert factor_list( + f) == (1, [(x + 1, 2469134), (x + 2, 20000000), (x**2 + 1, 1)]) + assert factor_list(g) == (1, [(y + 1, 2), (x + 1, 6000)]) + + f = (x**2 - y**2)**200000*(x**7 + 1) + g = (x**2 + y**2)**200000*(x**7 + 1) + + assert factor(f) == \ + (x + 1)*(x - y)**200000*(x + y)**200000*(x**6 - x**5 + + x**4 - x**3 + x**2 - x + 1) + assert factor(g, gaussian=True) == \ + (x + 1)*(x - I*y)**200000*(x + I*y)**200000*(x**6 - x**5 + + x**4 - x**3 + x**2 - x + 1) + + assert factor_list(f) == \ + (1, [(x + 1, 1), (x - y, 200000), (x + y, 200000), (x**6 - + x**5 + x**4 - x**3 + x**2 - x + 1, 1)]) + assert factor_list(g, gaussian=True) == \ + (1, [(x + 1, 1), (x - I*y, 200000), (x + I*y, 200000), ( + x**6 - x**5 + x**4 - x**3 + x**2 - x + 1, 1)]) + + +def test_factor_noeval(): + assert factor(6*x - 10) == Mul(2, 3*x - 5, evaluate=False) + assert factor((6*x - 10)/(3*x - 6)) == Mul(Rational(2, 3), 3*x - 5, 1/(x - 2)) + + +def test_intervals(): + assert intervals(0) == [] + assert intervals(1) == [] + + assert intervals(x, sqf=True) == [(0, 0)] + assert intervals(x) == [((0, 0), 1)] + + assert intervals(x**128) == [((0, 0), 128)] + assert intervals([x**2, x**4]) == [((0, 0), {0: 2, 1: 4})] + + f = Poly((x*Rational(2, 5) - Rational(17, 3))*(4*x + Rational(1, 257))) + + assert f.intervals(sqf=True) == [(-1, 0), (14, 15)] + assert f.intervals() == [((-1, 0), 1), ((14, 15), 1)] + + assert f.intervals(fast=True, sqf=True) == [(-1, 0), (14, 15)] + assert f.intervals(fast=True) == [((-1, 0), 1), ((14, 15), 1)] + + assert f.intervals(eps=Rational(1, 10)) == f.intervals(eps=0.1) == \ + [((Rational(-1, 258), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert f.intervals(eps=Rational(1, 100)) == f.intervals(eps=0.01) == \ + [((Rational(-1, 258), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert f.intervals(eps=Rational(1, 1000)) == f.intervals(eps=0.001) == \ + [((Rational(-1, 1002), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert f.intervals(eps=Rational(1, 10000)) == f.intervals(eps=0.0001) == \ + [((Rational(-1, 1028), Rational(-1, 1028)), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + + f = (x*Rational(2, 5) - Rational(17, 3))*(4*x + Rational(1, 257)) + + assert intervals(f, sqf=True) == [(-1, 0), (14, 15)] + assert intervals(f) == [((-1, 0), 1), ((14, 15), 1)] + + assert intervals(f, eps=Rational(1, 10)) == intervals(f, eps=0.1) == \ + [((Rational(-1, 258), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert intervals(f, eps=Rational(1, 100)) == intervals(f, eps=0.01) == \ + [((Rational(-1, 258), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert intervals(f, eps=Rational(1, 1000)) == intervals(f, eps=0.001) == \ + [((Rational(-1, 1002), 0), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + assert intervals(f, eps=Rational(1, 10000)) == intervals(f, eps=0.0001) == \ + [((Rational(-1, 1028), Rational(-1, 1028)), 1), ((Rational(85, 6), Rational(85, 6)), 1)] + + f = Poly((x**2 - 2)*(x**2 - 3)**7*(x + 1)*(7*x + 3)**3) + + assert f.intervals() == \ + [((-2, Rational(-3, 2)), 7), ((Rational(-3, 2), -1), 1), + ((-1, -1), 1), ((-1, 0), 3), + ((1, Rational(3, 2)), 1), ((Rational(3, 2), 2), 7)] + + assert intervals([x**5 - 200, x**5 - 201]) == \ + [((Rational(75, 26), Rational(101, 35)), {0: 1}), ((Rational(309, 107), Rational(26, 9)), {1: 1})] + + assert intervals([x**5 - 200, x**5 - 201], fast=True) == \ + [((Rational(75, 26), Rational(101, 35)), {0: 1}), ((Rational(309, 107), Rational(26, 9)), {1: 1})] + + assert intervals([x**2 - 200, x**2 - 201]) == \ + [((Rational(-71, 5), Rational(-85, 6)), {1: 1}), ((Rational(-85, 6), -14), {0: 1}), + ((14, Rational(85, 6)), {0: 1}), ((Rational(85, 6), Rational(71, 5)), {1: 1})] + + assert intervals([x + 1, x + 2, x - 1, x + 1, 1, x - 1, x - 1, (x - 2)**2]) == \ + [((-2, -2), {1: 1}), ((-1, -1), {0: 1, 3: 1}), ((1, 1), {2: + 1, 5: 1, 6: 1}), ((2, 2), {7: 2})] + + f, g, h = x**2 - 2, x**4 - 4*x**2 + 4, x - 1 + + assert intervals(f, inf=Rational(7, 4), sqf=True) == [] + assert intervals(f, inf=Rational(7, 5), sqf=True) == [(Rational(7, 5), Rational(3, 2))] + assert intervals(f, sup=Rational(7, 4), sqf=True) == [(-2, -1), (1, Rational(3, 2))] + assert intervals(f, sup=Rational(7, 5), sqf=True) == [(-2, -1)] + + assert intervals(g, inf=Rational(7, 4)) == [] + assert intervals(g, inf=Rational(7, 5)) == [((Rational(7, 5), Rational(3, 2)), 2)] + assert intervals(g, sup=Rational(7, 4)) == [((-2, -1), 2), ((1, Rational(3, 2)), 2)] + assert intervals(g, sup=Rational(7, 5)) == [((-2, -1), 2)] + + assert intervals([g, h], inf=Rational(7, 4)) == [] + assert intervals([g, h], inf=Rational(7, 5)) == [((Rational(7, 5), Rational(3, 2)), {0: 2})] + assert intervals([g, h], sup=S( + 7)/4) == [((-2, -1), {0: 2}), ((1, 1), {1: 1}), ((1, Rational(3, 2)), {0: 2})] + assert intervals( + [g, h], sup=Rational(7, 5)) == [((-2, -1), {0: 2}), ((1, 1), {1: 1})] + + assert intervals([x + 2, x**2 - 2]) == \ + [((-2, -2), {0: 1}), ((-2, -1), {1: 1}), ((1, 2), {1: 1})] + assert intervals([x + 2, x**2 - 2], strict=True) == \ + [((-2, -2), {0: 1}), ((Rational(-3, 2), -1), {1: 1}), ((1, 2), {1: 1})] + + f = 7*z**4 - 19*z**3 + 20*z**2 + 17*z + 20 + + assert intervals(f) == [] + + real_part, complex_part = intervals(f, all=True, sqf=True) + + assert real_part == [] + assert all(re(a) < re(r) < re(b) and im( + a) < im(r) < im(b) for (a, b), r in zip(complex_part, nroots(f))) + + assert complex_part == [(Rational(-40, 7) - I*40/7, 0), + (Rational(-40, 7), I*40/7), + (I*Rational(-40, 7), Rational(40, 7)), + (0, Rational(40, 7) + I*40/7)] + + real_part, complex_part = intervals(f, all=True, sqf=True, eps=Rational(1, 10)) + + assert real_part == [] + assert all(re(a) < re(r) < re(b) and im( + a) < im(r) < im(b) for (a, b), r in zip(complex_part, nroots(f))) + + raises(ValueError, lambda: intervals(x**2 - 2, eps=10**-100000)) + raises(ValueError, lambda: Poly(x**2 - 2).intervals(eps=10**-100000)) + raises( + ValueError, lambda: intervals([x**2 - 2, x**2 - 3], eps=10**-100000)) + + +def test_refine_root(): + f = Poly(x**2 - 2) + + assert f.refine_root(1, 2, steps=0) == (1, 2) + assert f.refine_root(-2, -1, steps=0) == (-2, -1) + + assert f.refine_root(1, 2, steps=None) == (1, Rational(3, 2)) + assert f.refine_root(-2, -1, steps=None) == (Rational(-3, 2), -1) + + assert f.refine_root(1, 2, steps=1) == (1, Rational(3, 2)) + assert f.refine_root(-2, -1, steps=1) == (Rational(-3, 2), -1) + + assert f.refine_root(1, 2, steps=1, fast=True) == (1, Rational(3, 2)) + assert f.refine_root(-2, -1, steps=1, fast=True) == (Rational(-3, 2), -1) + + assert f.refine_root(1, 2, eps=Rational(1, 100)) == (Rational(24, 17), Rational(17, 12)) + assert f.refine_root(1, 2, eps=1e-2) == (Rational(24, 17), Rational(17, 12)) + + raises(PolynomialError, lambda: (f**2).refine_root(1, 2, check_sqf=True)) + + raises(RefinementFailed, lambda: (f**2).refine_root(1, 2)) + raises(RefinementFailed, lambda: (f**2).refine_root(2, 3)) + + f = x**2 - 2 + + assert refine_root(f, 1, 2, steps=1) == (1, Rational(3, 2)) + assert refine_root(f, -2, -1, steps=1) == (Rational(-3, 2), -1) + + assert refine_root(f, 1, 2, steps=1, fast=True) == (1, Rational(3, 2)) + assert refine_root(f, -2, -1, steps=1, fast=True) == (Rational(-3, 2), -1) + + assert refine_root(f, 1, 2, eps=Rational(1, 100)) == (Rational(24, 17), Rational(17, 12)) + assert refine_root(f, 1, 2, eps=1e-2) == (Rational(24, 17), Rational(17, 12)) + + raises(PolynomialError, lambda: refine_root(1, 7, 8, eps=Rational(1, 100))) + + raises(ValueError, lambda: Poly(f).refine_root(1, 2, eps=10**-100000)) + raises(ValueError, lambda: refine_root(f, 1, 2, eps=10**-100000)) + + +def test_count_roots(): + assert count_roots(x**2 - 2) == 2 + + assert count_roots(x**2 - 2, inf=-oo) == 2 + assert count_roots(x**2 - 2, sup=+oo) == 2 + assert count_roots(x**2 - 2, inf=-oo, sup=+oo) == 2 + + assert count_roots(x**2 - 2, inf=-2) == 2 + assert count_roots(x**2 - 2, inf=-1) == 1 + + assert count_roots(x**2 - 2, sup=1) == 1 + assert count_roots(x**2 - 2, sup=2) == 2 + + assert count_roots(x**2 - 2, inf=-1, sup=1) == 0 + assert count_roots(x**2 - 2, inf=-2, sup=2) == 2 + + assert count_roots(x**2 - 2, inf=-1, sup=1) == 0 + assert count_roots(x**2 - 2, inf=-2, sup=2) == 2 + + assert count_roots(x**2 + 2) == 0 + assert count_roots(x**2 + 2, inf=-2*I) == 2 + assert count_roots(x**2 + 2, sup=+2*I) == 2 + assert count_roots(x**2 + 2, inf=-2*I, sup=+2*I) == 2 + + assert count_roots(x**2 + 2, inf=0) == 0 + assert count_roots(x**2 + 2, sup=0) == 0 + + assert count_roots(x**2 + 2, inf=-I) == 1 + assert count_roots(x**2 + 2, sup=+I) == 1 + + assert count_roots(x**2 + 2, inf=+I/2, sup=+I) == 0 + assert count_roots(x**2 + 2, inf=-I, sup=-I/2) == 0 + + raises(PolynomialError, lambda: count_roots(1)) + + +def test_count_roots_extension(): + + p1 = Poly(sqrt(2)*x**2 - 2, x, extension=True) + assert p1.count_roots() == 2 + assert p1.count_roots(inf=0) == 1 + assert p1.count_roots(sup=0) == 1 + + p2 = Poly(x**2 + sqrt(2), x, extension=True) + assert p2.count_roots() == 0 + + p3 = Poly(x**2 + 2*sqrt(2)*x + 1, x, extension=True) + assert p3.count_roots() == 2 + assert p3.count_roots(inf=-10, sup=10) == 2 + assert p3.count_roots(inf=-10, sup=0) == 2 + assert p3.count_roots(inf=-10, sup=-3) == 0 + assert p3.count_roots(inf=-3, sup=-2) == 1 + assert p3.count_roots(inf=-1, sup=0) == 1 + + +def test_Poly_root(): + f = Poly(2*x**3 - 7*x**2 + 4*x + 4) + + assert f.root(0) == Rational(-1, 2) + assert f.root(1) == 2 + assert f.root(2) == 2 + raises(IndexError, lambda: f.root(3)) + + assert Poly(x**5 + x + 1).root(0) == rootof(x**3 - x**2 + 1, 0) + + +def test_real_roots(): + + assert real_roots(x) == [0] + assert real_roots(x, multiple=False) == [(0, 1)] + + assert real_roots(x**3) == [0, 0, 0] + assert real_roots(x**3, multiple=False) == [(0, 3)] + + assert real_roots(x*(x**3 + x + 3)) == [rootof(x**3 + x + 3, 0), 0] + assert real_roots(x*(x**3 + x + 3), multiple=False) == [(rootof( + x**3 + x + 3, 0), 1), (0, 1)] + + assert real_roots( + x**3*(x**3 + x + 3)) == [rootof(x**3 + x + 3, 0), 0, 0, 0] + assert real_roots(x**3*(x**3 + x + 3), multiple=False) == [(rootof( + x**3 + x + 3, 0), 1), (0, 3)] + + assert real_roots(x**2 - 2, radicals=False) == [ + rootof(x**2 - 2, 0, radicals=False), + rootof(x**2 - 2, 1, radicals=False), + ] + + f = 2*x**3 - 7*x**2 + 4*x + 4 + g = x**3 + x + 1 + + assert Poly(f).real_roots() == [Rational(-1, 2), 2, 2] + assert Poly(g).real_roots() == [rootof(g, 0)] + + # testing extension + f = x**2 - sqrt(2) + roots = [-2**(S(1)/4), 2**(S(1)/4)] + raises(NotImplementedError, lambda: real_roots(f)) + raises(NotImplementedError, lambda: real_roots(Poly(f, x))) + assert real_roots(f, extension=True) == roots + assert real_roots(Poly(f, extension=True)) == roots + assert real_roots(Poly(f), extension=True) == roots + + +def test_all_roots(): + + f = 2*x**3 - 7*x**2 + 4*x + 4 + froots = [Rational(-1, 2), 2, 2] + assert all_roots(f) == Poly(f).all_roots() == froots + + g = x**3 + x + 1 + groots = [rootof(g, 0), rootof(g, 1), rootof(g, 2)] + assert all_roots(g) == Poly(g).all_roots() == groots + + assert all_roots(x**2 - 2) == [-sqrt(2), sqrt(2)] + assert all_roots(x**2 - 2, multiple=False) == [(-sqrt(2), 1), (sqrt(2), 1)] + assert all_roots(x**2 - 2, radicals=False) == [ + rootof(x**2 - 2, 0, radicals=False), + rootof(x**2 - 2, 1, radicals=False), + ] + + p = x**5 - x - 1 + assert all_roots(p) == [ + rootof(p, 0), rootof(p, 1), rootof(p, 2), rootof(p, 3), rootof(p, 4) + ] + + # testing extension + f = x**2 + sqrt(2) + roots = [-2**(S(1)/4)*I, 2**(S(1)/4)*I] + raises(NotImplementedError, lambda: all_roots(f)) + raises(NotImplementedError, lambda : all_roots(Poly(f, x))) + assert all_roots(f, extension=True) == roots + assert all_roots(Poly(f, extension=True)) == roots + assert all_roots(Poly(f), extension=True) == roots + + +def test_nroots(): + assert Poly(0, x).nroots() == [] + assert Poly(1, x).nroots() == [] + + assert Poly(x**2 - 1, x).nroots() == [-1.0, 1.0] + assert Poly(x**2 + 1, x).nroots() == [-1.0*I, 1.0*I] + + roots = Poly(x**2 - 1, x).nroots() + assert roots == [-1.0, 1.0] + + roots = Poly(x**2 + 1, x).nroots() + assert roots == [-1.0*I, 1.0*I] + + roots = Poly(x**2/3 - Rational(1, 3), x).nroots() + assert roots == [-1.0, 1.0] + + roots = Poly(x**2/3 + Rational(1, 3), x).nroots() + assert roots == [-1.0*I, 1.0*I] + + assert Poly(x**2 + 2*I, x).nroots() == [-1.0 + 1.0*I, 1.0 - 1.0*I] + assert Poly( + x**2 + 2*I, x, extension=I).nroots() == [-1.0 + 1.0*I, 1.0 - 1.0*I] + + assert Poly(0.2*x + 0.1).nroots() == [-0.5] + + roots = nroots(x**5 + x + 1, n=5) + eps = Float("1e-5") + + assert re(roots[0]).epsilon_eq(-0.75487, eps) is S.true + assert im(roots[0]) == 0 + assert re(roots[1]) == Float(-0.5, 5) + assert im(roots[1]).epsilon_eq(-0.86602, eps) is S.true + assert re(roots[2]) == Float(-0.5, 5) + assert im(roots[2]).epsilon_eq(+0.86602, eps) is S.true + assert re(roots[3]).epsilon_eq(+0.87743, eps) is S.true + assert im(roots[3]).epsilon_eq(-0.74486, eps) is S.true + assert re(roots[4]).epsilon_eq(+0.87743, eps) is S.true + assert im(roots[4]).epsilon_eq(+0.74486, eps) is S.true + + eps = Float("1e-6") + + assert re(roots[0]).epsilon_eq(-0.75487, eps) is S.false + assert im(roots[0]) == 0 + assert re(roots[1]) == Float(-0.5, 5) + assert im(roots[1]).epsilon_eq(-0.86602, eps) is S.false + assert re(roots[2]) == Float(-0.5, 5) + assert im(roots[2]).epsilon_eq(+0.86602, eps) is S.false + assert re(roots[3]).epsilon_eq(+0.87743, eps) is S.false + assert im(roots[3]).epsilon_eq(-0.74486, eps) is S.false + assert re(roots[4]).epsilon_eq(+0.87743, eps) is S.false + assert im(roots[4]).epsilon_eq(+0.74486, eps) is S.false + + raises(DomainError, lambda: Poly(x + y, x).nroots()) + raises(MultivariatePolynomialError, lambda: Poly(x + y).nroots()) + + assert nroots(x**2 - 1) == [-1.0, 1.0] + + roots = nroots(x**2 - 1) + assert roots == [-1.0, 1.0] + + assert nroots(x + I) == [-1.0*I] + assert nroots(x + 2*I) == [-2.0*I] + + raises(PolynomialError, lambda: nroots(0)) + + # issue 8296 + f = Poly(x**4 - 1) + assert f.nroots(2) == [w.n(2) for w in f.all_roots()] + + assert str(Poly(x**16 + 32*x**14 + 508*x**12 + 5440*x**10 + + 39510*x**8 + 204320*x**6 + 755548*x**4 + 1434496*x**2 + + 877969).nroots(2)) == ('[-1.7 - 1.9*I, -1.7 + 1.9*I, -1.7 ' + '- 2.5*I, -1.7 + 2.5*I, -1.0*I, 1.0*I, -1.7*I, 1.7*I, -2.8*I, ' + '2.8*I, -3.4*I, 3.4*I, 1.7 - 1.9*I, 1.7 + 1.9*I, 1.7 - 2.5*I, ' + '1.7 + 2.5*I]') + assert str(Poly(1e-15*x**2 -1).nroots()) == ('[-31622776.6016838, 31622776.6016838]') + + # https://github.com/sympy/sympy/issues/23861 + + i = Float('3.000000000000000000000000000000000000000000000000001') + [r] = nroots(x + I*i, n=300) + assert abs(r + I*i) < 1e-300 + + +def test_ground_roots(): + f = x**6 - 4*x**4 + 4*x**3 - x**2 + + assert Poly(f).ground_roots() == {S.One: 2, S.Zero: 2} + assert ground_roots(f) == {S.One: 2, S.Zero: 2} + + +def test_nth_power_roots_poly(): + f = x**4 - x**2 + 1 + + f_2 = (x**2 - x + 1)**2 + f_3 = (x**2 + 1)**2 + f_4 = (x**2 + x + 1)**2 + f_12 = (x - 1)**4 + + assert nth_power_roots_poly(f, 1) == f + + raises(ValueError, lambda: nth_power_roots_poly(f, 0)) + raises(ValueError, lambda: nth_power_roots_poly(f, x)) + + assert factor(nth_power_roots_poly(f, 2)) == f_2 + assert factor(nth_power_roots_poly(f, 3)) == f_3 + assert factor(nth_power_roots_poly(f, 4)) == f_4 + assert factor(nth_power_roots_poly(f, 12)) == f_12 + + raises(MultivariatePolynomialError, lambda: nth_power_roots_poly( + x + y, 2, x, y)) + +def test_which_real_roots(): + f = Poly(x**4 - 1) + + assert f.which_real_roots([1, -1]) == [1, -1] + assert f.which_real_roots([1, -1, 2, 4]) == [1, -1] + assert f.which_real_roots([1, -1, -1, 1, 2, 5]) == [1, -1] + assert f.which_real_roots([10, 8, 7, -1, 1]) == [-1, 1] + + # no real roots + # (technically its still a superset) + f = Poly(x**2 + 1) + assert f.which_real_roots([5, 10]) == [] + + # not square free + f = Poly((x-1)**2) + assert f.which_real_roots([1, 1, -1, 2]) == [1] + + # candidates not superset + f = Poly(x**2 - 1) + assert f.which_real_roots([0, 2]) == [0, 2] + +def test_which_all_roots(): + f = Poly(x**4 - 1) + + assert f.which_all_roots([1, -1, I, -I]) == [1, -1, I, -I] + assert f.which_all_roots([I, I, -I, 1, -1]) == [I, -I, 1, -1] + + f = Poly(x**2 + 1) + assert f.which_all_roots([I, -I, I/2]) == [I, -I] + + # not square free + f = Poly((x-I)**2) + assert f.which_all_roots([I, I, 1, -1, 0]) == [I] + + # candidates not superset + f = Poly(x**2 + 1) + assert f.which_all_roots([I/2, -I/2]) == [I/2, -I/2] + +def test_same_root(): + f = Poly(x**4 + x**3 + x**2 + x + 1) + eq = f.same_root + r0 = exp(2 * I * pi / 5) + assert [i for i, r in enumerate(f.all_roots()) if eq(r, r0)] == [3] + + raises(PolynomialError, + lambda: Poly(x + 1, domain=QQ).same_root(0, 0)) + raises(DomainError, + lambda: Poly(x**2 + 1, domain=FF(7)).same_root(0, 0)) + raises(DomainError, + lambda: Poly(x ** 2 + 1, domain=ZZ_I).same_root(0, 0)) + raises(DomainError, + lambda: Poly(y * x**2 + 1, domain=ZZ[y]).same_root(0, 0)) + raises(MultivariatePolynomialError, + lambda: Poly(x * y + 1, domain=ZZ).same_root(0, 0)) + + +def test_torational_factor_list(): + p = expand(((x**2-1)*(x-2)).subs({x:x*(1 + sqrt(2))})) + assert _torational_factor_list(p, x) == (-2, [ + (-x*(1 + sqrt(2))/2 + 1, 1), + (-x*(1 + sqrt(2)) - 1, 1), + (-x*(1 + sqrt(2)) + 1, 1)]) + + + p = expand(((x**2-1)*(x-2)).subs({x:x*(1 + 2**Rational(1, 4))})) + assert _torational_factor_list(p, x) is None + + +def test_cancel(): + assert cancel(0) == 0 + assert cancel(7) == 7 + assert cancel(x) == x + + assert cancel(oo) is oo + + raises(ValueError, lambda: cancel((1, 2, 3))) + + # test first tuple returnr + assert (t:=cancel((2, 3))) == (1, 2, 3) + assert isinstance(t, tuple) + + # tests 2nd tuple return + assert (t:=cancel((1, 0), x)) == (1, 1, 0) + assert isinstance(t, tuple) + assert cancel((0, 1), x) == (1, 0, 1) + + f, g, p, q = 4*x**2 - 4, 2*x - 2, 2*x + 2, 1 + F, G, P, Q = [ Poly(u, x) for u in (f, g, p, q) ] + + assert F.cancel(G) == (1, P, Q) + assert cancel((f, g)) == (1, p, q) + assert cancel((f, g), x) == (1, p, q) + assert cancel((f, g), (x,)) == (1, p, q) + # tests 3rd tuple return + assert (t:=cancel((F, G))) == (1, P, Q) + assert isinstance(t, tuple) + assert cancel((f, g), polys=True) == (1, P, Q) + assert cancel((F, G), polys=False) == (1, p, q) + + f = (x**2 - 2)/(x + sqrt(2)) + + assert cancel(f) == f + assert cancel(f, greedy=False) == x - sqrt(2) + + f = (x**2 - 2)/(x - sqrt(2)) + + assert cancel(f) == f + assert cancel(f, greedy=False) == x + sqrt(2) + + assert cancel((x**2/4 - 1, x/2 - 1)) == (1, x + 2, 2) + # assert cancel((x**2/4 - 1, x/2 - 1)) == (S.Half, x + 2, 1) + + assert cancel((x**2 - y)/(x - y)) == 1/(x - y)*(x**2 - y) + + assert cancel((x**2 - y**2)/(x - y), x) == x + y + assert cancel((x**2 - y**2)/(x - y), y) == x + y + assert cancel((x**2 - y**2)/(x - y)) == x + y + + assert cancel((x**3 - 1)/(x**2 - 1)) == (x**2 + x + 1)/(x + 1) + assert cancel((x**3/2 - S.Half)/(x**2 - 1)) == (x**2 + x + 1)/(2*x + 2) + + assert cancel((exp(2*x) + 2*exp(x) + 1)/(exp(x) + 1)) == exp(x) + 1 + + f = Poly(x**2 - a**2, x) + g = Poly(x - a, x) + + F = Poly(x + a, x, domain='ZZ[a]') + G = Poly(1, x, domain='ZZ[a]') + + assert cancel((f, g)) == (1, F, G) + + f = x**3 + (sqrt(2) - 2)*x**2 - (2*sqrt(2) + 3)*x - 3*sqrt(2) + g = x**2 - 2 + + assert cancel((f, g), extension=True) == (1, x**2 - 2*x - 3, x - sqrt(2)) + + f = Poly(-2*x + 3, x) + g = Poly(-x**9 + x**8 + x**6 - x**5 + 2*x**2 - 3*x + 1, x) + + assert cancel((f, g)) == (1, -f, -g) + + f = Poly(x/3 + 1, x) + g = Poly(x/7 + 1, x) + + assert f.cancel(g) == (S(7)/3, + Poly(x + 3, x, domain=QQ), + Poly(x + 7, x, domain=QQ)) + assert f.cancel(g, include=True) == ( + Poly(7*x + 21, x, domain=QQ), + Poly(3*x + 21, x, domain=QQ)) + + pairs = [ + (1 + x, 1 + x, 1, 1, 1), + (1 + x, 1 - x, -1, -1-x, -1+x), + (1 - x, 1 + x, -1, 1-x, 1+x), + (1 - x, 1 - x, 1, 1, 1), + ] + for f, g, coeff, p, q in pairs: + assert cancel((f, g)) == (1, p, q) + pf = Poly(f, x) + pg = Poly(g, x) + pp = Poly(p, x) + pq = Poly(q, x) + assert pf.cancel(pg) == (coeff, coeff*pp, pq) + assert pf.rep.cancel(pg.rep) == (pp.rep, pq.rep) + assert pf.rep.cancel(pg.rep, include=True) == (pp.rep, pq.rep) + + f = Poly(y, y, domain='ZZ(x)') + g = Poly(1, y, domain='ZZ[x]') + + assert f.cancel( + g) == (1, Poly(y, y, domain='ZZ(x)'), Poly(1, y, domain='ZZ(x)')) + assert f.cancel(g, include=True) == ( + Poly(y, y, domain='ZZ(x)'), Poly(1, y, domain='ZZ(x)')) + + f = Poly(5*x*y + x, y, domain='ZZ(x)') + g = Poly(2*x**2*y, y, domain='ZZ(x)') + + assert f.cancel(g, include=True) == ( + Poly(5*y + 1, y, domain='ZZ(x)'), Poly(2*x*y, y, domain='ZZ(x)')) + + f = -(-2*x - 4*y + 0.005*(z - y)**2)/((z - y)*(-z + y + 2)) + assert cancel(f).is_Mul == True + + P = tanh(x - 3.0) + Q = tanh(x + 3.0) + f = ((-2*P**2 + 2)*(-P**2 + 1)*Q**2/2 + (-2*P**2 + 2)*(-2*Q**2 + 2)*P*Q - (-2*P**2 + 2)*P**2*Q**2 + (-2*Q**2 + 2)*(-Q**2 + 1)*P**2/2 - (-2*Q**2 + 2)*P**2*Q**2)/(2*sqrt(P**2*Q**2 + 0.0001)) \ + + (-(-2*P**2 + 2)*P*Q**2/2 - (-2*Q**2 + 2)*P**2*Q/2)*((-2*P**2 + 2)*P*Q**2/2 + (-2*Q**2 + 2)*P**2*Q/2)/(2*(P**2*Q**2 + 0.0001)**Rational(3, 2)) + assert cancel(f).is_Mul == True + + # issue 7022 + A = Symbol('A', commutative=False) + p1 = Piecewise((A*(x**2 - 1)/(x + 1), x > 1), ((x + 2)/(x**2 + 2*x), True)) + p2 = Piecewise((A*(x - 1), x > 1), (1/x, True)) + assert cancel(p1) == p2 + assert cancel(2*p1) == 2*p2 + assert cancel(1 + p1) == 1 + p2 + assert cancel((x**2 - 1)/(x + 1)*p1) == (x - 1)*p2 + assert cancel((x**2 - 1)/(x + 1) + p1) == (x - 1) + p2 + p3 = Piecewise(((x**2 - 1)/(x + 1), x > 1), ((x + 2)/(x**2 + 2*x), True)) + p4 = Piecewise(((x - 1), x > 1), (1/x, True)) + assert cancel(p3) == p4 + assert cancel(2*p3) == 2*p4 + assert cancel(1 + p3) == 1 + p4 + assert cancel((x**2 - 1)/(x + 1)*p3) == (x - 1)*p4 + assert cancel((x**2 - 1)/(x + 1) + p3) == (x - 1) + p4 + + # issue 4077 + q = S('''(2*1*(x - 1/x)/(x*(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - + 1/x)) - 2/x)) - 2*1*((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - + 1/x)))*((-x + 1/x)*((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - + 1/x)))/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - + 2/x) + 1)*((x - 1/x)/((x - 1/x)**2) - ((x - 1/x)/((x*(x - 1/x)**2)) - + 1/(x*(x - 1/x)))**2/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x + - 1/x)) - 2/x) - 1/(x - 1/x))*(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - + 1/(x**2*(x - 1/x)) - 2/x)/x - 1/x)*(((-x + 1/x)/((x*(x - 1/x)**2)) + + 1/(x*(x - 1/x)))*((-(x - 1/x)/(x*(x - 1/x)) - 1/x)*((x - 1/x)/((x*(x - + 1/x)**2)) - 1/(x*(x - 1/x)))/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - + 1/(x**2*(x - 1/x)) - 2/x) - 1 + (x - 1/x)/(x - 1/x))/((x*((x - + 1/x)/((x - 1/x)**2) - ((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - + 1/x)))**2/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - + 2/x) - 1/(x - 1/x))*(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x + - 1/x)) - 2/x))) + ((x - 1/x)/((x*(x - 1/x))) + 1/x)/((x*(2*x - (-x + + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - 2/x))) + 1/x)/(2*x + + 2*((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - 1/x)))*((-(x - 1/x)/(x*(x + - 1/x)) - 1/x)*((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - 1/x)))/(2*x - + (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - 2/x) - 1 + (x - + 1/x)/(x - 1/x))/((x*((x - 1/x)/((x - 1/x)**2) - ((x - 1/x)/((x*(x - + 1/x)**2)) - 1/(x*(x - 1/x)))**2/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) + - 1/(x**2*(x - 1/x)) - 2/x) - 1/(x - 1/x))*(2*x - (-x + 1/x)/(x**2*(x + - 1/x)**2) - 1/(x**2*(x - 1/x)) - 2/x))) - 2*((x - 1/x)/((x*(x - + 1/x))) + 1/x)/(x*(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - + 1/x)) - 2/x)) - 2/x) - ((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - + 1/x)))*((-x + 1/x)*((x - 1/x)/((x*(x - 1/x)**2)) - 1/(x*(x - + 1/x)))/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - + 2/x) + 1)/(x*((x - 1/x)/((x - 1/x)**2) - ((x - 1/x)/((x*(x - 1/x)**2)) + - 1/(x*(x - 1/x)))**2/(2*x - (-x + 1/x)/(x**2*(x - 1/x)**2) - + 1/(x**2*(x - 1/x)) - 2/x) - 1/(x - 1/x))*(2*x - (-x + 1/x)/(x**2*(x - + 1/x)**2) - 1/(x**2*(x - 1/x)) - 2/x)) + (x - 1/x)/((x*(2*x - (-x + + 1/x)/(x**2*(x - 1/x)**2) - 1/(x**2*(x - 1/x)) - 2/x))) - 1/x''', + evaluate=False) + assert cancel(q, _signsimp=False) is S.NaN + assert q.subs(x, 2) is S.NaN + assert signsimp(q) is S.NaN + + # issue 9363 + M = MatrixSymbol('M', 5, 5) + assert cancel(M[0,0] + 7) == M[0,0] + 7 + expr = sin(M[1, 4] + M[2, 1] * 5 * M[4, 0]) - 5 * M[1, 2] / z + assert cancel(expr) == (z*sin(M[1, 4] + M[2, 1] * 5 * M[4, 0]) - 5 * M[1, 2]) / z + + assert cancel((x**2 + 1)/(x - I)) == x + I + + +def test_cancel_modulus(): + assert cancel((x**2 - 1)/(x + 1), modulus=2) == x + 1 + assert Poly(x**2 - 1, modulus=2).cancel(Poly(x + 1, modulus=2)) ==\ + (1, Poly(x + 1, modulus=2), Poly(1, x, modulus=2)) + + +def test_make_monic_over_integers_by_scaling_roots(): + f = Poly(x**2 + 3*x + 4, x, domain='ZZ') + g, c = f.make_monic_over_integers_by_scaling_roots() + assert g == f + assert c == ZZ.one + + f = Poly(x**2 + 3*x + 4, x, domain='QQ') + g, c = f.make_monic_over_integers_by_scaling_roots() + assert g == f.to_ring() + assert c == ZZ.one + + f = Poly(x**2/2 + S(1)/4 * x + S(1)/8, x, domain='QQ') + g, c = f.make_monic_over_integers_by_scaling_roots() + assert g == Poly(x**2 + 2*x + 4, x, domain='ZZ') + assert c == 4 + + f = Poly(x**3/2 + S(1)/4 * x + S(1)/8, x, domain='QQ') + g, c = f.make_monic_over_integers_by_scaling_roots() + assert g == Poly(x**3 + 8*x + 16, x, domain='ZZ') + assert c == 4 + + f = Poly(x*y, x, y) + raises(ValueError, lambda: f.make_monic_over_integers_by_scaling_roots()) + + f = Poly(x, domain='RR') + raises(ValueError, lambda: f.make_monic_over_integers_by_scaling_roots()) + + +def test_galois_group(): + f = Poly(x ** 4 - 2) + G, alt = f.galois_group(by_name=True) + assert G == S4TransitiveSubgroups.D4 + assert alt is False + + +def test_reduced(): + f = 2*x**4 + y**2 - x**2 + y**3 + G = [x**3 - x, y**3 - y] + + Q = [2*x, 1] + r = x**2 + y**2 + y + + assert reduced(f, G) == (Q, r) + assert reduced(f, G, x, y) == (Q, r) + + H = groebner(G) + + assert H.reduce(f) == (Q, r) + + Q = [Poly(2*x, x, y), Poly(1, x, y)] + r = Poly(x**2 + y**2 + y, x, y) + + assert _strict_eq(reduced(f, G, polys=True), (Q, r)) + assert _strict_eq(reduced(f, G, x, y, polys=True), (Q, r)) + + H = groebner(G, polys=True) + + assert _strict_eq(H.reduce(f), (Q, r)) + + f = 2*x**3 + y**3 + 3*y + G = groebner([x**2 + y**2 - 1, x*y - 2]) + + Q = [x**2 - x*y**3/2 + x*y/2 + y**6/4 - y**4/2 + y**2/4, -y**5/4 + y**3/2 + y*Rational(3, 4)] + r = 0 + + assert reduced(f, G) == (Q, r) + assert G.reduce(f) == (Q, r) + + assert reduced(f, G, auto=False)[1] != 0 + assert G.reduce(f, auto=False)[1] != 0 + + assert G.contains(f) is True + assert G.contains(f + 1) is False + + assert reduced(1, [1], x) == ([1], 0) + raises(ComputationFailed, lambda: reduced(1, [1])) + + f_poly = Poly(2*x**3 + y**3 + 3*y) + G_poly = groebner([Poly(x**2 + y**2 - 1), Poly(x*y - 2)]) + + Q_poly = [Poly(x**2 - 1/2*x*y**3 + 1/2*x*y + 1/4*y**6 - 1/2*y**4 + 1/4*y**2, x, y, domain='QQ'), + Poly(-1/4*y**5 + 1/2*y**3 + 3/4*y, x, y, domain='QQ')] + r_poly = Poly(0, x, y, domain='QQ') + + assert G_poly.reduce(f_poly) == (Q_poly, r_poly) + + Q, r = G_poly.reduce(f) + assert all(isinstance(q, Poly) for q in Q) + assert isinstance(r, Poly) + + f_wrong_gens = Poly(2*x**3 + y**3 + 3*y, x, y, z) + raises(ValueError, lambda: G_poly.reduce(f_wrong_gens)) + + zero_poly = Poly(0, x, y) + Q, r = G_poly.reduce(zero_poly) + assert all(q.is_zero for q in Q) + assert r.is_zero + + const_poly = Poly(1, x, y) + Q, r = G_poly.reduce(const_poly) + assert isinstance(r, Poly) + assert r.as_expr() == 1 + assert all(q.is_zero for q in Q) + + +def test_groebner(): + assert groebner([], x, y, z) == [] + + assert groebner([x**2 + 1, y**4*x + x**3], x, y, order='lex') == [1 + x**2, -1 + y**4] + assert groebner([x**2 + 1, y**4*x + x**3, x*y*z**3], x, y, z, order='grevlex') == [-1 + y**4, z**3, 1 + x**2] + + assert groebner([x**2 + 1, y**4*x + x**3], x, y, order='lex', polys=True) == \ + [Poly(1 + x**2, x, y), Poly(-1 + y**4, x, y)] + assert groebner([x**2 + 1, y**4*x + x**3, x*y*z**3], x, y, z, order='grevlex', polys=True) == \ + [Poly(-1 + y**4, x, y, z), Poly(z**3, x, y, z), Poly(1 + x**2, x, y, z)] + + assert groebner([x**3 - 1, x**2 - 1]) == [x - 1] + assert groebner([Eq(x**3, 1), Eq(x**2, 1)]) == [x - 1] + + F = [3*x**2 + y*z - 5*x - 1, 2*x + 3*x*y + y**2, x - 3*y + x*z - 2*z**2] + f = z**9 - x**2*y**3 - 3*x*y**2*z + 11*y*z**2 + x**2*z**2 - 5 + + G = groebner(F, x, y, z, modulus=7, symmetric=False) + + assert G == [1 + x + y + 3*z + 2*z**2 + 2*z**3 + 6*z**4 + z**5, + 1 + 3*y + y**2 + 6*z**2 + 3*z**3 + 3*z**4 + 3*z**5 + 4*z**6, + 1 + 4*y + 4*z + y*z + 4*z**3 + z**4 + z**6, + 6 + 6*z + z**2 + 4*z**3 + 3*z**4 + 6*z**5 + 3*z**6 + z**7] + + Q, r = reduced(f, G, x, y, z, modulus=7, symmetric=False, polys=True) + + assert sum([ q*g for q, g in zip(Q, G.polys)], r) == Poly(f, modulus=7) + + F = [x*y - 2*y, 2*y**2 - x**2] + + assert groebner(F, x, y, order='grevlex') == \ + [y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y] + assert groebner(F, y, x, order='grevlex') == \ + [x**3 - 2*x**2, -x**2 + 2*y**2, x*y - 2*y] + assert groebner(F, order='grevlex', field=True) == \ + [y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y] + + assert groebner([1], x) == [1] + + assert groebner([x**2 + 2.0*y], x, y) == [1.0*x**2 + 2.0*y] + raises(ComputationFailed, lambda: groebner([1])) + + assert groebner([x**2 - 1, x**3 + 1], method='buchberger') == [x + 1] + assert groebner([x**2 - 1, x**3 + 1], method='f5b') == [x + 1] + + raises(ValueError, lambda: groebner([x, y], method='unknown')) + + +def test_fglm(): + F = [a + b + c + d, a*b + a*d + b*c + b*d, a*b*c + a*b*d + a*c*d + b*c*d, a*b*c*d - 1] + G = groebner(F, a, b, c, d, order=grlex) + + B = [ + 4*a + 3*d**9 - 4*d**5 - 3*d, + 4*b + 4*c - 3*d**9 + 4*d**5 + 7*d, + 4*c**2 + 3*d**10 - 4*d**6 - 3*d**2, + 4*c*d**4 + 4*c - d**9 + 4*d**5 + 5*d, + d**12 - d**8 - d**4 + 1, + ] + + assert groebner(F, a, b, c, d, order=lex) == B + assert G.fglm(lex) == B + + F = [9*x**8 + 36*x**7 - 32*x**6 - 252*x**5 - 78*x**4 + 468*x**3 + 288*x**2 - 108*x + 9, + -72*t*x**7 - 252*t*x**6 + 192*t*x**5 + 1260*t*x**4 + 312*t*x**3 - 404*t*x**2 - 576*t*x + \ + 108*t - 72*x**7 - 256*x**6 + 192*x**5 + 1280*x**4 + 312*x**3 - 576*x + 96] + G = groebner(F, t, x, order=grlex) + + B = [ + 203577793572507451707*t + 627982239411707112*x**7 - 666924143779443762*x**6 - \ + 10874593056632447619*x**5 + 5119998792707079562*x**4 + 72917161949456066376*x**3 + \ + 20362663855832380362*x**2 - 142079311455258371571*x + 183756699868981873194, + 9*x**8 + 36*x**7 - 32*x**6 - 252*x**5 - 78*x**4 + 468*x**3 + 288*x**2 - 108*x + 9, + ] + + assert groebner(F, t, x, order=lex) == B + assert G.fglm(lex) == B + + F = [x**2 - x - 3*y + 1, -2*x + y**2 + y - 1] + G = groebner(F, x, y, order=lex) + + B = [ + x**2 - x - 3*y + 1, + y**2 - 2*x + y - 1, + ] + + assert groebner(F, x, y, order=grlex) == B + assert G.fglm(grlex) == B + + +def test_is_zero_dimensional(): + assert is_zero_dimensional([x, y], x, y) is True + assert is_zero_dimensional([x**3 + y**2], x, y) is False + + assert is_zero_dimensional([x, y, z], x, y, z) is True + assert is_zero_dimensional([x, y, z], x, y, z, t) is False + + F = [x*y - z, y*z - x, x*y - y] + assert is_zero_dimensional(F, x, y, z) is True + + F = [x**2 - 2*x*z + 5, x*y**2 + y*z**3, 3*y**2 - 8*z**2] + assert is_zero_dimensional(F, x, y, z) is True + + +def test_GroebnerBasis(): + F = [x*y - 2*y, 2*y**2 - x**2] + + G = groebner(F, x, y, order='grevlex') + H = [y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y] + P = [ Poly(h, x, y) for h in H ] + + assert groebner(F + [0], x, y, order='grevlex') == G + assert isinstance(G, GroebnerBasis) is True + + assert len(G) == 3 + + assert G[0] == H[0] and not G[0].is_Poly + assert G[1] == H[1] and not G[1].is_Poly + assert G[2] == H[2] and not G[2].is_Poly + + assert G[1:] == H[1:] and not any(g.is_Poly for g in G[1:]) + assert G[:2] == H[:2] and not any(g.is_Poly for g in G[1:]) + + assert G.exprs == H + assert G.polys == P + assert G.gens == (x, y) + assert G.domain == ZZ + assert G.order == grevlex + + assert G == H + assert G == tuple(H) + assert G == P + assert G == tuple(P) + + assert G != [] + + G = groebner(F, x, y, order='grevlex', polys=True) + + assert G[0] == P[0] and G[0].is_Poly + assert G[1] == P[1] and G[1].is_Poly + assert G[2] == P[2] and G[2].is_Poly + + assert G[1:] == P[1:] and all(g.is_Poly for g in G[1:]) + assert G[:2] == P[:2] and all(g.is_Poly for g in G[1:]) + + +def test_poly(): + assert poly(x) == Poly(x, x) + assert poly(y) == Poly(y, y) + + assert poly(x + y) == Poly(x + y, x, y) + assert poly(x + sin(x)) == Poly(x + sin(x), x, sin(x)) + + assert poly(x + y, wrt=y) == Poly(x + y, y, x) + assert poly(x + sin(x), wrt=sin(x)) == Poly(x + sin(x), sin(x), x) + + assert poly(x*y + 2*x*z**2 + 17) == Poly(x*y + 2*x*z**2 + 17, x, y, z) + + assert poly(2*(y + z)**2 - 1) == Poly(2*y**2 + 4*y*z + 2*z**2 - 1, y, z) + assert poly( + x*(y + z)**2 - 1) == Poly(x*y**2 + 2*x*y*z + x*z**2 - 1, x, y, z) + assert poly(2*x*( + y + z)**2 - 1) == Poly(2*x*y**2 + 4*x*y*z + 2*x*z**2 - 1, x, y, z) + + assert poly(2*( + y + z)**2 - x - 1) == Poly(2*y**2 + 4*y*z + 2*z**2 - x - 1, x, y, z) + assert poly(x*( + y + z)**2 - x - 1) == Poly(x*y**2 + 2*x*y*z + x*z**2 - x - 1, x, y, z) + assert poly(2*x*(y + z)**2 - x - 1) == Poly(2*x*y**2 + 4*x*y*z + 2* + x*z**2 - x - 1, x, y, z) + + assert poly(x*y + (x + y)**2 + (x + z)**2) == \ + Poly(2*x*z + 3*x*y + y**2 + z**2 + 2*x**2, x, y, z) + assert poly(x*y*(x + y)*(x + z)**2) == \ + Poly(x**3*y**2 + x*y**2*z**2 + y*x**2*z**2 + 2*z*x**2* + y**2 + 2*y*z*x**3 + y*x**4, x, y, z) + + assert poly(Poly(x + y + z, y, x, z)) == Poly(x + y + z, y, x, z) + + assert poly((x + y)**2, x) == Poly(x**2 + 2*x*y + y**2, x, domain=ZZ[y]) + assert poly((x + y)**2, y) == Poly(x**2 + 2*x*y + y**2, y, domain=ZZ[x]) + + assert poly(1, x) == Poly(1, x) + raises(GeneratorsNeeded, lambda: poly(1)) + + # issue 6184 + assert poly(x + y, x, y) == Poly(x + y, x, y) + assert poly(x + y, y, x) == Poly(x + y, y, x) + + # https://github.com/sympy/sympy/issues/19755 + expr1 = x + (2*x + 3)**2/5 + S(6)/5 + assert poly(expr1).as_expr() == expr1.expand() + expr2 = y*(y+1) + S(1)/3 + assert poly(expr2).as_expr() == expr2.expand() + + +def test_keep_coeff(): + u = Mul(2, x + 1, evaluate=False) + assert _keep_coeff(S.One, x) == x + assert _keep_coeff(S.NegativeOne, x) == -x + assert _keep_coeff(S(1.0), x) == 1.0*x + assert _keep_coeff(S(-1.0), x) == -1.0*x + assert _keep_coeff(S.One, 2*x) == 2*x + assert _keep_coeff(S(2), x/2) == x + assert _keep_coeff(S(2), sin(x)) == 2*sin(x) + assert _keep_coeff(S(2), x + 1) == u + assert _keep_coeff(x, 1/x) == 1 + assert _keep_coeff(x + 1, S(2)) == u + assert _keep_coeff(S.Half, S.One) == S.Half + p = Pow(2, 3, evaluate=False) + assert _keep_coeff(S(-1), p) == Mul(-1, p, evaluate=False) + a = Add(2, p, evaluate=False) + assert _keep_coeff(S.Half, a, clear=True + ) == Mul(S.Half, a, evaluate=False) + assert _keep_coeff(S.Half, a, clear=False + ) == Add(1, Mul(S.Half, p, evaluate=False), evaluate=False) + + +def test_poly_matching_consistency(): + # Test for this issue: + # https://github.com/sympy/sympy/issues/5514 + assert I * Poly(x, x) == Poly(I*x, x) + assert Poly(x, x) * I == Poly(I*x, x) + + +def test_issue_5786(): + assert expand(factor(expand( + (x - I*y)*(z - I*t)), extension=[I])) == -I*t*x - t*y + x*z - I*y*z + + +def test_noncommutative(): + class foo(Expr): + is_commutative=False + e = x/(x + x*y) + c = 1/( 1 + y) + assert cancel(foo(e)) == foo(c) + assert cancel(e + foo(e)) == c + foo(c) + assert cancel(e*foo(c)) == c*foo(c) + + +def test_to_rational_coeffs(): + assert to_rational_coeffs( + Poly(x**3 + y*x**2 + sqrt(y), x, domain='EX')) is None + # issue 21268 + assert to_rational_coeffs( + Poly(y**3 + sqrt(2)*y**2*sin(x) + 1, y)) is None + + assert to_rational_coeffs(Poly(x, y)) is None + assert to_rational_coeffs(Poly(sqrt(2)*y)) is None + + +def test_factor_terms(): + # issue 7067 + assert factor_list(x*(x + y)) == (1, [(x, 1), (x + y, 1)]) + assert sqf_list(x*(x + y)) == (1, [(x**2 + x*y, 1)]) + + +def test_as_list(): + # issue 14496 + assert Poly(x**3 + 2, x, domain='ZZ').as_list() == [1, 0, 0, 2] + assert Poly(x**2 + y + 1, x, y, domain='ZZ').as_list() == [[1], [], [1, 1]] + assert Poly(x**2 + y + 1, x, y, z, domain='ZZ').as_list() == \ + [[[1]], [[]], [[1], [1]]] + + +def test_issue_11198(): + assert factor_list(sqrt(2)*x) == (sqrt(2), [(x, 1)]) + assert factor_list(sqrt(2)*sin(x), sin(x)) == (sqrt(2), [(sin(x), 1)]) + + +def test_Poly_precision(): + # Make sure Poly doesn't lose precision + p = Poly(pi.evalf(100)*x) + assert p.as_expr() == pi.evalf(100)*x + + +def test_issue_12400(): + # Correction of check for negative exponents + assert poly(1/(1+sqrt(2)), x) == \ + Poly(1/(1+sqrt(2)), x, domain='EX') + +def test_issue_14364(): + assert gcd(S(6)*(1 + sqrt(3))/5, S(3)*(1 + sqrt(3))/10) == Rational(3, 10) * (1 + sqrt(3)) + assert gcd(sqrt(5)*Rational(4, 7), sqrt(5)*Rational(2, 3)) == sqrt(5)*Rational(2, 21) + + assert lcm(Rational(2, 3)*sqrt(3), Rational(5, 6)*sqrt(3)) == S(10)*sqrt(3)/3 + assert lcm(3*sqrt(3), 4/sqrt(3)) == 12*sqrt(3) + assert lcm(S(5)*(1 + 2**Rational(1, 3))/6, S(3)*(1 + 2**Rational(1, 3))/8) == Rational(15, 2) * (1 + 2**Rational(1, 3)) + + assert gcd(Rational(2, 3)*sqrt(3), Rational(5, 6)/sqrt(3)) == sqrt(3)/18 + assert gcd(S(4)*sqrt(13)/7, S(3)*sqrt(13)/14) == sqrt(13)/14 + + # gcd_list and lcm_list + assert gcd([S(2)*sqrt(47)/7, S(6)*sqrt(47)/5, S(8)*sqrt(47)/5]) == sqrt(47)*Rational(2, 35) + assert gcd([S(6)*(1 + sqrt(7))/5, S(2)*(1 + sqrt(7))/7, S(4)*(1 + sqrt(7))/13]) == (1 + sqrt(7))*Rational(2, 455) + assert lcm((Rational(7, 2)/sqrt(15), Rational(5, 6)/sqrt(15), Rational(5, 8)/sqrt(15))) == Rational(35, 2)/sqrt(15) + assert lcm([S(5)*(2 + 2**Rational(5, 7))/6, S(7)*(2 + 2**Rational(5, 7))/2, S(13)*(2 + 2**Rational(5, 7))/4]) == Rational(455, 2) * (2 + 2**Rational(5, 7)) + + +def test_issue_15669(): + x = Symbol("x", positive=True) + expr = (16*x**3/(-x**2 + sqrt(8*x**2 + (x**2 - 2)**2) + 2)**2 - + 2*2**Rational(4, 5)*x*(-x**2 + sqrt(8*x**2 + (x**2 - 2)**2) + 2)**Rational(3, 5) + 10*x) + assert factor(expr, deep=True) == x*(x**2 + 2) + + +def test_issue_17988(): + x = Symbol('x') + p = poly(x - 1) + with warns_deprecated_sympy(): + M = Matrix([[poly(x + 1), poly(x + 1)]]) + with warns(SymPyDeprecationWarning, test_stacklevel=False): + assert p * M == M * p == Matrix([[poly(x**2 - 1), poly(x**2 - 1)]]) + + +def test_issue_18205(): + assert cancel((2 + I)*(3 - I)) == 7 + I + assert cancel((2 + I)*(2 - I)) == 5 + + +def test_issue_8695(): + p = (x**2 + 1) * (x - 1)**2 * (x - 2)**3 * (x - 3)**3 + result = (1, [(x**2 + 1, 1), (x - 1, 2), (x**2 - 5*x + 6, 3)]) + assert sqf_list(p) == result + + +def test_issue_19113(): + eq = sin(x)**3 - sin(x) + 1 + raises(PolynomialError, lambda: refine_root(eq, 1, 2, 1e-2)) + raises(PolynomialError, lambda: count_roots(eq, -1, 1)) + raises(PolynomialError, lambda: real_roots(eq)) + raises(PolynomialError, lambda: nroots(eq)) + raises(PolynomialError, lambda: ground_roots(eq)) + raises(PolynomialError, lambda: nth_power_roots_poly(eq, 2)) + + +def test_issue_19360(): + f = 2*x**2 - 2*sqrt(2)*x*y + y**2 + assert factor(f, extension=sqrt(2)) == 2*(x - (sqrt(2)*y/2))**2 + + f = -I*t*x - t*y + x*z - I*y*z + assert factor(f, extension=I) == (x - I*y)*(-I*t + z) + + +def test_poly_copy_equals_original(): + poly = Poly(x + y, x, y, z) + copy = poly.copy() + assert poly == copy, ( + "Copied polynomial not equal to original.") + assert poly.gens == copy.gens, ( + "Copied polynomial has different generators than original.") + + +def test_deserialized_poly_equals_original(): + poly = Poly(x + y, x, y, z) + deserialized = pickle.loads(pickle.dumps(poly)) + assert poly == deserialized, ( + "Deserialized polynomial not equal to original.") + assert poly.gens == deserialized.gens, ( + "Deserialized polynomial has different generators than original.") + + +def test_issue_20389(): + result = degree(x * (x + 1) - x ** 2 - x, x) + assert result == -oo + + +def test_issue_20985(): + from sympy.core.symbol import symbols + w, R = symbols('w R') + poly = Poly(1.0 + I*w/R, w, 1/R) + assert poly.degree() == S(1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyutils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyutils.py new file mode 100644 index 0000000000000000000000000000000000000000..f39561a1c5035fed52add5e49476d0eea91bdae0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_polyutils.py @@ -0,0 +1,300 @@ +"""Tests for useful utilities for higher level polynomial classes. """ + +from sympy.core.mul import Mul +from sympy.core.numbers import (Integer, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.integrals.integrals import Integral +from sympy.testing.pytest import raises + +from sympy.polys.polyutils import ( + _nsort, + _sort_gens, + _unify_gens, + _analyze_gens, + _sort_factors, + parallel_dict_from_expr, + dict_from_expr, +) + +from sympy.polys.polyerrors import PolynomialError + +from sympy.polys.domains import ZZ + +x, y, z, p, q, r, s, t, u, v, w = symbols('x,y,z,p,q,r,s,t,u,v,w') +A, B = symbols('A,B', commutative=False) + + +def test__nsort(): + # issue 6137 + r = S('''[3/2 + sqrt(-14/3 - 2*(-415/216 + 13*I/12)**(1/3) - 4/sqrt(-7/3 + + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + 13*I/12)**(1/3)) - + 61/(18*(-415/216 + 13*I/12)**(1/3)))/2 - sqrt(-7/3 + 61/(18*(-415/216 + + 13*I/12)**(1/3)) + 2*(-415/216 + 13*I/12)**(1/3))/2, 3/2 - sqrt(-7/3 + + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + + 13*I/12)**(1/3))/2 - sqrt(-14/3 - 2*(-415/216 + 13*I/12)**(1/3) - + 4/sqrt(-7/3 + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + + 13*I/12)**(1/3)) - 61/(18*(-415/216 + 13*I/12)**(1/3)))/2, 3/2 + + sqrt(-14/3 - 2*(-415/216 + 13*I/12)**(1/3) + 4/sqrt(-7/3 + + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + 13*I/12)**(1/3)) - + 61/(18*(-415/216 + 13*I/12)**(1/3)))/2 + sqrt(-7/3 + 61/(18*(-415/216 + + 13*I/12)**(1/3)) + 2*(-415/216 + 13*I/12)**(1/3))/2, 3/2 + sqrt(-7/3 + + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + + 13*I/12)**(1/3))/2 - sqrt(-14/3 - 2*(-415/216 + 13*I/12)**(1/3) + + 4/sqrt(-7/3 + 61/(18*(-415/216 + 13*I/12)**(1/3)) + 2*(-415/216 + + 13*I/12)**(1/3)) - 61/(18*(-415/216 + 13*I/12)**(1/3)))/2]''') + ans = [r[1], r[0], r[-1], r[-2]] + assert _nsort(r) == ans + assert len(_nsort(r, separated=True)[0]) == 0 + b, c, a = exp(-1000), exp(-999), exp(-1001) + assert _nsort((b, c, a)) == [a, b, c] + # issue 12560 + a = cos(1)**2 + sin(1)**2 - 1 + assert _nsort([a]) == [a] + + +def test__sort_gens(): + assert _sort_gens([]) == () + + assert _sort_gens([x]) == (x,) + assert _sort_gens([p]) == (p,) + assert _sort_gens([q]) == (q,) + + assert _sort_gens([x, p]) == (x, p) + assert _sort_gens([p, x]) == (x, p) + assert _sort_gens([q, p]) == (p, q) + + assert _sort_gens([q, p, x]) == (x, p, q) + + assert _sort_gens([x, p, q], wrt=x) == (x, p, q) + assert _sort_gens([x, p, q], wrt=p) == (p, x, q) + assert _sort_gens([x, p, q], wrt=q) == (q, x, p) + + assert _sort_gens([x, p, q], wrt='x') == (x, p, q) + assert _sort_gens([x, p, q], wrt='p') == (p, x, q) + assert _sort_gens([x, p, q], wrt='q') == (q, x, p) + + assert _sort_gens([x, p, q], wrt='x,q') == (x, q, p) + assert _sort_gens([x, p, q], wrt='q,x') == (q, x, p) + assert _sort_gens([x, p, q], wrt='p,q') == (p, q, x) + assert _sort_gens([x, p, q], wrt='q,p') == (q, p, x) + + assert _sort_gens([x, p, q], wrt='x, q') == (x, q, p) + assert _sort_gens([x, p, q], wrt='q, x') == (q, x, p) + assert _sort_gens([x, p, q], wrt='p, q') == (p, q, x) + assert _sort_gens([x, p, q], wrt='q, p') == (q, p, x) + + assert _sort_gens([x, p, q], wrt=[x, 'q']) == (x, q, p) + assert _sort_gens([x, p, q], wrt=[q, 'x']) == (q, x, p) + assert _sort_gens([x, p, q], wrt=[p, 'q']) == (p, q, x) + assert _sort_gens([x, p, q], wrt=[q, 'p']) == (q, p, x) + + assert _sort_gens([x, p, q], wrt=['x', 'q']) == (x, q, p) + assert _sort_gens([x, p, q], wrt=['q', 'x']) == (q, x, p) + assert _sort_gens([x, p, q], wrt=['p', 'q']) == (p, q, x) + assert _sort_gens([x, p, q], wrt=['q', 'p']) == (q, p, x) + + assert _sort_gens([x, p, q], sort='x > p > q') == (x, p, q) + assert _sort_gens([x, p, q], sort='p > x > q') == (p, x, q) + assert _sort_gens([x, p, q], sort='p > q > x') == (p, q, x) + + assert _sort_gens([x, p, q], wrt='x', sort='q > p') == (x, q, p) + assert _sort_gens([x, p, q], wrt='p', sort='q > x') == (p, q, x) + assert _sort_gens([x, p, q], wrt='q', sort='p > x') == (q, p, x) + + # https://github.com/sympy/sympy/issues/19353 + n1 = Symbol('\n1') + assert _sort_gens([n1]) == (n1,) + assert _sort_gens([x, n1]) == (x, n1) + + X = symbols('x0,x1,x2,x10,x11,x12,x20,x21,x22') + + assert _sort_gens(X) == X + + +def test__unify_gens(): + assert _unify_gens([], []) == () + + assert _unify_gens([x], [x]) == (x,) + assert _unify_gens([y], [y]) == (y,) + + assert _unify_gens([x, y], [x]) == (x, y) + assert _unify_gens([x], [x, y]) == (x, y) + + assert _unify_gens([x, y], [x, y]) == (x, y) + assert _unify_gens([y, x], [y, x]) == (y, x) + + assert _unify_gens([x], [y]) == (x, y) + assert _unify_gens([y], [x]) == (y, x) + + assert _unify_gens([x], [y, x]) == (y, x) + assert _unify_gens([y, x], [x]) == (y, x) + + assert _unify_gens([x, y, z], [x, y, z]) == (x, y, z) + assert _unify_gens([z, y, x], [x, y, z]) == (z, y, x) + assert _unify_gens([x, y, z], [z, y, x]) == (x, y, z) + assert _unify_gens([z, y, x], [z, y, x]) == (z, y, x) + + assert _unify_gens([x, y, z], [t, x, p, q, z]) == (t, x, y, p, q, z) + + +def test__analyze_gens(): + assert _analyze_gens((x, y, z)) == (x, y, z) + assert _analyze_gens([x, y, z]) == (x, y, z) + + assert _analyze_gens(([x, y, z],)) == (x, y, z) + assert _analyze_gens(((x, y, z),)) == (x, y, z) + + +def test__sort_factors(): + assert _sort_factors([], multiple=True) == [] + assert _sort_factors([], multiple=False) == [] + + F = [[1, 2, 3], [1, 2], [1]] + G = [[1], [1, 2], [1, 2, 3]] + + assert _sort_factors(F, multiple=False) == G + + F = [[1, 2], [1, 2, 3], [1, 2], [1]] + G = [[1], [1, 2], [1, 2], [1, 2, 3]] + + assert _sort_factors(F, multiple=False) == G + + F = [[2, 2], [1, 2, 3], [1, 2], [1]] + G = [[1], [1, 2], [2, 2], [1, 2, 3]] + + assert _sort_factors(F, multiple=False) == G + + F = [([1, 2, 3], 1), ([1, 2], 1), ([1], 1)] + G = [([1], 1), ([1, 2], 1), ([1, 2, 3], 1)] + + assert _sort_factors(F, multiple=True) == G + + F = [([1, 2], 1), ([1, 2, 3], 1), ([1, 2], 1), ([1], 1)] + G = [([1], 1), ([1, 2], 1), ([1, 2], 1), ([1, 2, 3], 1)] + + assert _sort_factors(F, multiple=True) == G + + F = [([2, 2], 1), ([1, 2, 3], 1), ([1, 2], 1), ([1], 1)] + G = [([1], 1), ([1, 2], 1), ([2, 2], 1), ([1, 2, 3], 1)] + + assert _sort_factors(F, multiple=True) == G + + F = [([2, 2], 1), ([1, 2, 3], 1), ([1, 2], 2), ([1], 1)] + G = [([1], 1), ([2, 2], 1), ([1, 2], 2), ([1, 2, 3], 1)] + + assert _sort_factors(F, multiple=True) == G + + +def test__dict_from_expr_if_gens(): + assert dict_from_expr( + Integer(17), gens=(x,)) == ({(0,): Integer(17)}, (x,)) + assert dict_from_expr( + Integer(17), gens=(x, y)) == ({(0, 0): Integer(17)}, (x, y)) + assert dict_from_expr( + Integer(17), gens=(x, y, z)) == ({(0, 0, 0): Integer(17)}, (x, y, z)) + + assert dict_from_expr( + Integer(-17), gens=(x,)) == ({(0,): Integer(-17)}, (x,)) + assert dict_from_expr( + Integer(-17), gens=(x, y)) == ({(0, 0): Integer(-17)}, (x, y)) + assert dict_from_expr(Integer( + -17), gens=(x, y, z)) == ({(0, 0, 0): Integer(-17)}, (x, y, z)) + + assert dict_from_expr( + Integer(17)*x, gens=(x,)) == ({(1,): Integer(17)}, (x,)) + assert dict_from_expr( + Integer(17)*x, gens=(x, y)) == ({(1, 0): Integer(17)}, (x, y)) + assert dict_from_expr(Integer( + 17)*x, gens=(x, y, z)) == ({(1, 0, 0): Integer(17)}, (x, y, z)) + + assert dict_from_expr( + Integer(17)*x**7, gens=(x,)) == ({(7,): Integer(17)}, (x,)) + assert dict_from_expr( + Integer(17)*x**7*y, gens=(x, y)) == ({(7, 1): Integer(17)}, (x, y)) + assert dict_from_expr(Integer(17)*x**7*y*z**12, gens=( + x, y, z)) == ({(7, 1, 12): Integer(17)}, (x, y, z)) + + assert dict_from_expr(x + 2*y + 3*z, gens=(x,)) == \ + ({(1,): Integer(1), (0,): 2*y + 3*z}, (x,)) + assert dict_from_expr(x + 2*y + 3*z, gens=(x, y)) == \ + ({(1, 0): Integer(1), (0, 1): Integer(2), (0, 0): 3*z}, (x, y)) + assert dict_from_expr(x + 2*y + 3*z, gens=(x, y, z)) == \ + ({(1, 0, 0): Integer( + 1), (0, 1, 0): Integer(2), (0, 0, 1): Integer(3)}, (x, y, z)) + + assert dict_from_expr(x*y + 2*x*z + 3*y*z, gens=(x,)) == \ + ({(1,): y + 2*z, (0,): 3*y*z}, (x,)) + assert dict_from_expr(x*y + 2*x*z + 3*y*z, gens=(x, y)) == \ + ({(1, 1): Integer(1), (1, 0): 2*z, (0, 1): 3*z}, (x, y)) + assert dict_from_expr(x*y + 2*x*z + 3*y*z, gens=(x, y, z)) == \ + ({(1, 1, 0): Integer( + 1), (1, 0, 1): Integer(2), (0, 1, 1): Integer(3)}, (x, y, z)) + + assert dict_from_expr(2**y*x, gens=(x,)) == ({(1,): 2**y}, (x,)) + assert dict_from_expr(Integral(x, (x, 1, 2)) + x) == ( + {(0, 1): 1, (1, 0): 1}, (x, Integral(x, (x, 1, 2)))) + raises(PolynomialError, lambda: dict_from_expr(2**y*x, gens=(x, y))) + + +def test__dict_from_expr_no_gens(): + assert dict_from_expr(Integer(17)) == ({(): Integer(17)}, ()) + + assert dict_from_expr(x) == ({(1,): Integer(1)}, (x,)) + assert dict_from_expr(y) == ({(1,): Integer(1)}, (y,)) + + assert dict_from_expr(x*y) == ({(1, 1): Integer(1)}, (x, y)) + assert dict_from_expr( + x + y) == ({(1, 0): Integer(1), (0, 1): Integer(1)}, (x, y)) + + assert dict_from_expr(sqrt(2)) == ({(1,): Integer(1)}, (sqrt(2),)) + assert dict_from_expr(sqrt(2), greedy=False) == ({(): sqrt(2)}, ()) + + assert dict_from_expr(x*y, domain=ZZ[x]) == ({(1,): x}, (y,)) + assert dict_from_expr(x*y, domain=ZZ[y]) == ({(1,): y}, (x,)) + + assert dict_from_expr(3*sqrt( + 2)*pi*x*y, extension=None) == ({(1, 1, 1, 1): 3}, (x, y, pi, sqrt(2))) + assert dict_from_expr(3*sqrt( + 2)*pi*x*y, extension=True) == ({(1, 1, 1): 3*sqrt(2)}, (x, y, pi)) + + assert dict_from_expr(3*sqrt( + 2)*pi*x*y, extension=True) == ({(1, 1, 1): 3*sqrt(2)}, (x, y, pi)) + + f = cos(x)*sin(x) + cos(x)*sin(y) + cos(y)*sin(x) + cos(y)*sin(y) + + assert dict_from_expr(f) == ({(0, 1, 0, 1): 1, (0, 1, 1, 0): 1, + (1, 0, 0, 1): 1, (1, 0, 1, 0): 1}, (cos(x), cos(y), sin(x), sin(y))) + + +def test__parallel_dict_from_expr_if_gens(): + assert parallel_dict_from_expr([x + 2*y + 3*z, Integer(7)], gens=(x,)) == \ + ([{(1,): Integer(1), (0,): 2*y + 3*z}, {(0,): Integer(7)}], (x,)) + + +def test__parallel_dict_from_expr_no_gens(): + assert parallel_dict_from_expr([x*y, Integer(3)]) == \ + ([{(1, 1): Integer(1)}, {(0, 0): Integer(3)}], (x, y)) + assert parallel_dict_from_expr([x*y, 2*z, Integer(3)]) == \ + ([{(1, 1, 0): Integer( + 1)}, {(0, 0, 1): Integer(2)}, {(0, 0, 0): Integer(3)}], (x, y, z)) + assert parallel_dict_from_expr((Mul(x, x**2, evaluate=False),)) == \ + ([{(3,): 1}], (x,)) + + +def test_parallel_dict_from_expr(): + assert parallel_dict_from_expr([Eq(x, 1), Eq( + x**2, 2)]) == ([{(0,): -Integer(1), (1,): Integer(1)}, + {(0,): -Integer(2), (2,): Integer(1)}], (x,)) + raises(PolynomialError, lambda: parallel_dict_from_expr([A*B - B*A])) + + +def test_dict_from_expr(): + assert dict_from_expr(Eq(x, 1)) == \ + ({(0,): -Integer(1), (1,): Integer(1)}, (x,)) + raises(PolynomialError, lambda: dict_from_expr(A*B - B*A)) + raises(PolynomialError, lambda: dict_from_expr(S.true)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_puiseux.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_puiseux.py new file mode 100644 index 0000000000000000000000000000000000000000..031881e9d12c53053d8ec7136374bd8b3a385df0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_puiseux.py @@ -0,0 +1,204 @@ +# +# Tests for PuiseuxRing and PuiseuxPoly +# + +from sympy.testing.pytest import raises + +from sympy import ZZ, QQ, ring +from sympy.polys.puiseux import PuiseuxRing, PuiseuxPoly, puiseux_ring + +from sympy.abc import x, y + + +def test_puiseux_ring(): + R, px = puiseux_ring('x', QQ) + R2, px2 = puiseux_ring([x], QQ) + assert isinstance(R, PuiseuxRing) + assert isinstance(px, PuiseuxPoly) + assert R == R2 + assert px == px2 + assert R == PuiseuxRing('x', QQ) + assert R == PuiseuxRing([x], QQ) + assert R != PuiseuxRing('y', QQ) + assert R != PuiseuxRing('x', ZZ) + assert R != PuiseuxRing('x, y', QQ) + assert R != QQ + assert str(R) == 'PuiseuxRing((x,), QQ)' + + +def test_puiseux_ring_attributes(): + R1, px1, py1 = ring('x, y', QQ) + R2, px2, py2 = puiseux_ring('x, y', QQ) + assert R2.domain == QQ + assert R2.symbols == (x, y) + assert R2.gens == (px2, py2) + assert R2.ngens == 2 + assert R2.poly_ring == R1 + assert R2.zero == PuiseuxPoly(R1.zero, R2) + assert R2.one == PuiseuxPoly(R1.one, R2) + assert R2.zero_monom == R1.zero_monom == (0, 0) # type: ignore + assert R2.monomial_mul((1, 2), (3, 4)) == (4, 6) + + +def test_puiseux_ring_methods(): + R1, px1, py1 = ring('x, y', QQ) + R2, px2, py2 = puiseux_ring('x, y', QQ) + assert R2({(1, 2): 3}) == 3*px2*py2**2 + assert R2(px1) == px2 + assert R2(1) == R2.one + assert R2(QQ(1,2)) == QQ(1,2)*R2.one + assert R2.from_poly(px1) == px2 + assert R2.from_poly(px1) != py2 + assert R2.from_dict({(1, 2): QQ(3)}) == 3*px2*py2**2 + assert R2.from_dict({(QQ(1,2), 2): QQ(3)}) == 3*px2**QQ(1,2)*py2**2 + assert R2.from_int(3) == 3*R2.one + assert R2.domain_new(3) == QQ(3) + assert QQ.of_type(R2.domain_new(3)) + assert R2.ground_new(3) == 3*R2.one + assert isinstance(R2.ground_new(3), PuiseuxPoly) + assert R2.index(px2) == 0 + assert R2.index(py2) == 1 + + +def test_puiseux_poly(): + R1, px1 = ring('x', QQ) + R2, px2 = puiseux_ring('x', QQ) + assert PuiseuxPoly(px1, R2) == px2 + assert px2.ring == R2 + assert px2.as_expr() == px1.as_expr() == x + assert px1 != px2 + assert R2.one == px2**0 == 1 + assert px2 == px1 + assert px2 != 2.0 + assert px2**QQ(1,2) != px1 + + +def test_puiseux_poly_normalization(): + R, x = puiseux_ring('x', QQ) + assert (x**2 + 1) / x == x + 1/x == R({(1,): 1, (-1,): 1}) + assert (x**QQ(1,6))**2 == x**QQ(1,3) == R({(QQ(1,3),): 1}) + assert (x**QQ(1,6))**(-2) == x**(-QQ(1,3)) == R({(-QQ(1,3),): 1}) + assert (x**QQ(1,6))**QQ(1,2) == x**QQ(1,12) == R({(QQ(1,12),): 1}) + assert (x**QQ(1,6))**6 == x == R({(1,): 1}) + assert x**QQ(1,6) * x**QQ(1,3) == x**QQ(1,2) == R({(QQ(1,2),): 1}) + assert 1/x * x**2 == x == R({(1,): 1}) + assert 1/x**QQ(1,3) * x**QQ(1,3) == 1 == R({(0,): 1}) + + +def test_puiseux_poly_monoms(): + R, x = puiseux_ring('x', QQ) + assert x.monoms() == [(1,)] + assert list(x) == [(1,)] + assert (x**2 + 1).monoms() == [(2,), (0,)] + assert R({(1,): 1, (-1,): 1}).monoms() == [(1,), (-1,)] + assert R({(QQ(1,3),): 1}).monoms() == [(QQ(1,3),)] + assert R({(-QQ(1,3),): 1}).monoms() == [(-QQ(1,3),)] + p = x**QQ(1,6) + assert p[(QQ(1,6),)] == 1 + raises(KeyError, lambda: p[(1,)]) + assert p.to_dict() == {(QQ(1,6),): 1} + assert R(p.to_dict()) == p + assert PuiseuxPoly.from_dict({(QQ(1,6),): 1}, R) == p + + +def test_puiseux_poly_repr(): + R, x = puiseux_ring('x', QQ) + assert repr(x) == 'x' + assert repr(x**QQ(1,2)) == 'x**(1/2)' + assert repr(1/x) == 'x**(-1)' + assert repr(2*x**2 + 1) == '1 + 2*x**2' + assert repr(R.one) == '1' + assert repr(2*R.one) == '2' + + +def test_puiseux_poly_unify(): + R, x = puiseux_ring('x', QQ) + assert 1/x + x == x + 1/x == R({(1,): 1, (-1,): 1}) + assert repr(1/x + x) == 'x**(-1) + x' + assert 1/x + 1/x == 2/x == R({(-1,): 2}) + assert repr(1/x + 1/x) == '2*x**(-1)' + assert x**QQ(1,2) + x**QQ(1,2) == 2*x**QQ(1,2) == R({(QQ(1,2),): 2}) + assert repr(x**QQ(1,2) + x**QQ(1,2)) == '2*x**(1/2)' + assert x**QQ(1,2) + x**QQ(1,3) == R({(QQ(1,2),): 1, (QQ(1,3),): 1}) + assert repr(x**QQ(1,2) + x**QQ(1,3)) == 'x**(1/3) + x**(1/2)' + assert x + x**QQ(1,2) == R({(1,): 1, (QQ(1,2),): 1}) + assert repr(x + x**QQ(1,2)) == 'x**(1/2) + x' + assert 1/x**QQ(1,2) + 1/x**QQ(1,3) == R({(-QQ(1,2),): 1, (-QQ(1,3),): 1}) + assert repr(1/x**QQ(1,2) + 1/x**QQ(1,3)) == 'x**(-1/2) + x**(-1/3)' + assert 1/x + x**QQ(1,2) == x**QQ(1,2) + 1/x == R({(-1,): 1, (QQ(1,2),): 1}) + assert repr(1/x + x**QQ(1,2)) == 'x**(-1) + x**(1/2)' + + +def test_puiseux_poly_arit(): + R, x = puiseux_ring('x', QQ) + R2, y = puiseux_ring('y', QQ) + p = x**2 + 1 + assert +p == p + assert -p == -1 - x**2 + assert p + p == 2*p == 2*x**2 + 2 + assert p + 1 == 1 + p == x**2 + 2 + assert p + QQ(1,2) == QQ(1,2) + p == x**2 + QQ(3,2) + assert p - p == 0 + assert p - 1 == -1 + p == x**2 + assert p - QQ(1,2) == -QQ(1,2) + p == x**2 + QQ(1,2) + assert 1 - p == -p + 1 == -x**2 + assert QQ(1,2) - p == -p + QQ(1,2) == -x**2 - QQ(1,2) + assert p * p == x**4 + 2*x**2 + 1 + assert p * 1 == 1 * p == p + assert 2 * p == p * 2 == 2*x**2 + 2 + assert p * QQ(1,2) == QQ(1,2) * p == QQ(1,2)*x**2 + QQ(1,2) + assert x**QQ(1,2) * x**QQ(1,2) == x + raises(ValueError, lambda: x + y) + raises(ValueError, lambda: x - y) + raises(ValueError, lambda: x * y) + raises(TypeError, lambda: x + None) + raises(TypeError, lambda: x - None) + raises(TypeError, lambda: x * None) + raises(TypeError, lambda: None + x) + raises(TypeError, lambda: None - x) + raises(TypeError, lambda: None * x) + + +def test_puiseux_poly_div(): + R, x = puiseux_ring('x', QQ) + R2, y = puiseux_ring('y', QQ) + p = x**2 - 1 + assert p / 1 == p + assert p / QQ(1,2) == 2*p == 2*x**2 - 2 + assert p / x == x - 1/x == R({(1,): 1, (-1,): -1}) + assert 2 / x == 2*x**-1 == R({(-1,): 2}) + assert QQ(1,2) / x == QQ(1,2)*x**-1 == 1/(2*x) == 1/x/2 == R({(-1,): QQ(1,2)}) + raises(ZeroDivisionError, lambda: p / 0) + raises(ValueError, lambda: (x + 1) / (x + 2)) + raises(ValueError, lambda: (x + 1) / (x + 1)) + raises(ValueError, lambda: x / y) + raises(TypeError, lambda: x / None) + raises(TypeError, lambda: None / x) + + +def test_puiseux_poly_pow(): + R, x = puiseux_ring('x', QQ) + Rz, xz = puiseux_ring('x', ZZ) + assert x**0 == 1 == R({(0,): 1}) + assert x**1 == x == R({(1,): 1}) + assert x**2 == x*x == R({(2,): 1}) + assert x**QQ(1,2) == R({(QQ(1,2),): 1}) + assert x**-1 == 1/x == R({(-1,): 1}) + assert x**-QQ(1,2) == 1/x**QQ(1,2) == R({(-QQ(1,2),): 1}) + assert (2*x)**-1 == 1/(2*x) == QQ(1,2)/x == QQ(1,2)*x**-1 == R({(-1,): QQ(1,2)}) + assert 2/x**2 == 2*x**-2 == R({(-2,): 2}) + assert 2/xz**2 == 2*xz**-2 == Rz({(-2,): 2}) + raises(TypeError, lambda: x**None) + raises(ValueError, lambda: (x + 1)**-1) + raises(ValueError, lambda: (x + 1)**QQ(1,2)) + raises(ValueError, lambda: (2*x)**QQ(1,2)) + raises(ValueError, lambda: (2*xz)**-1) + + +def test_puiseux_poly_diff(): + R, x, y = puiseux_ring('x, y', QQ) + assert (x**2 + 1).diff(x) == 2*x + assert (x**2 + 1).diff(y) == 0 + assert (x**2 + y**2).diff(x) == 2*x + assert (x**QQ(1,2) + y**QQ(1,2)).diff(x) == QQ(1,2)*x**-QQ(1,2) + assert ((x*y)**QQ(1,2)).diff(x) == QQ(1,2)*y**QQ(1,2)*x**-QQ(1,2) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_pythonrational.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_pythonrational.py new file mode 100644 index 0000000000000000000000000000000000000000..547a5679626fd3a6165b151364bb506a574bb1db --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_pythonrational.py @@ -0,0 +1,139 @@ +"""Tests for PythonRational type. """ + +from sympy.polys.domains import PythonRational as QQ +from sympy.testing.pytest import raises + +def test_PythonRational__init__(): + assert QQ(0).numerator == 0 + assert QQ(0).denominator == 1 + assert QQ(0, 1).numerator == 0 + assert QQ(0, 1).denominator == 1 + assert QQ(0, -1).numerator == 0 + assert QQ(0, -1).denominator == 1 + + assert QQ(1).numerator == 1 + assert QQ(1).denominator == 1 + assert QQ(1, 1).numerator == 1 + assert QQ(1, 1).denominator == 1 + assert QQ(-1, -1).numerator == 1 + assert QQ(-1, -1).denominator == 1 + + assert QQ(-1).numerator == -1 + assert QQ(-1).denominator == 1 + assert QQ(-1, 1).numerator == -1 + assert QQ(-1, 1).denominator == 1 + assert QQ( 1, -1).numerator == -1 + assert QQ( 1, -1).denominator == 1 + + assert QQ(1, 2).numerator == 1 + assert QQ(1, 2).denominator == 2 + assert QQ(3, 4).numerator == 3 + assert QQ(3, 4).denominator == 4 + + assert QQ(2, 2).numerator == 1 + assert QQ(2, 2).denominator == 1 + assert QQ(2, 4).numerator == 1 + assert QQ(2, 4).denominator == 2 + +def test_PythonRational__hash__(): + assert hash(QQ(0)) == hash(0) + assert hash(QQ(1)) == hash(1) + assert hash(QQ(117)) == hash(117) + +def test_PythonRational__int__(): + assert int(QQ(-1, 4)) == 0 + assert int(QQ( 1, 4)) == 0 + assert int(QQ(-5, 4)) == -1 + assert int(QQ( 5, 4)) == 1 + +def test_PythonRational__float__(): + assert float(QQ(-1, 2)) == -0.5 + assert float(QQ( 1, 2)) == 0.5 + +def test_PythonRational__abs__(): + assert abs(QQ(-1, 2)) == QQ(1, 2) + assert abs(QQ( 1, 2)) == QQ(1, 2) + +def test_PythonRational__pos__(): + assert +QQ(-1, 2) == QQ(-1, 2) + assert +QQ( 1, 2) == QQ( 1, 2) + +def test_PythonRational__neg__(): + assert -QQ(-1, 2) == QQ( 1, 2) + assert -QQ( 1, 2) == QQ(-1, 2) + +def test_PythonRational__add__(): + assert QQ(-1, 2) + QQ( 1, 2) == QQ(0) + assert QQ( 1, 2) + QQ(-1, 2) == QQ(0) + + assert QQ(1, 2) + QQ(1, 2) == QQ(1) + assert QQ(1, 2) + QQ(3, 2) == QQ(2) + assert QQ(3, 2) + QQ(1, 2) == QQ(2) + assert QQ(3, 2) + QQ(3, 2) == QQ(3) + + assert 1 + QQ(1, 2) == QQ(3, 2) + assert QQ(1, 2) + 1 == QQ(3, 2) + +def test_PythonRational__sub__(): + assert QQ(-1, 2) - QQ( 1, 2) == QQ(-1) + assert QQ( 1, 2) - QQ(-1, 2) == QQ( 1) + + assert QQ(1, 2) - QQ(1, 2) == QQ( 0) + assert QQ(1, 2) - QQ(3, 2) == QQ(-1) + assert QQ(3, 2) - QQ(1, 2) == QQ( 1) + assert QQ(3, 2) - QQ(3, 2) == QQ( 0) + + assert 1 - QQ(1, 2) == QQ( 1, 2) + assert QQ(1, 2) - 1 == QQ(-1, 2) + +def test_PythonRational__mul__(): + assert QQ(-1, 2) * QQ( 1, 2) == QQ(-1, 4) + assert QQ( 1, 2) * QQ(-1, 2) == QQ(-1, 4) + + assert QQ(1, 2) * QQ(1, 2) == QQ(1, 4) + assert QQ(1, 2) * QQ(3, 2) == QQ(3, 4) + assert QQ(3, 2) * QQ(1, 2) == QQ(3, 4) + assert QQ(3, 2) * QQ(3, 2) == QQ(9, 4) + + assert 2 * QQ(1, 2) == QQ(1) + assert QQ(1, 2) * 2 == QQ(1) + +def test_PythonRational__truediv__(): + assert QQ(-1, 2) / QQ( 1, 2) == QQ(-1) + assert QQ( 1, 2) / QQ(-1, 2) == QQ(-1) + + assert QQ(1, 2) / QQ(1, 2) == QQ(1) + assert QQ(1, 2) / QQ(3, 2) == QQ(1, 3) + assert QQ(3, 2) / QQ(1, 2) == QQ(3) + assert QQ(3, 2) / QQ(3, 2) == QQ(1) + + assert 2 / QQ(1, 2) == QQ(4) + assert QQ(1, 2) / 2 == QQ(1, 4) + + raises(ZeroDivisionError, lambda: QQ(1, 2) / QQ(0)) + raises(ZeroDivisionError, lambda: QQ(1, 2) / 0) + +def test_PythonRational__pow__(): + assert QQ(1)**10 == QQ(1) + assert QQ(2)**10 == QQ(1024) + + assert QQ(1)**(-10) == QQ(1) + assert QQ(2)**(-10) == QQ(1, 1024) + +def test_PythonRational__eq__(): + assert (QQ(1, 2) == QQ(1, 2)) is True + assert (QQ(1, 2) != QQ(1, 2)) is False + + assert (QQ(1, 2) == QQ(1, 3)) is False + assert (QQ(1, 2) != QQ(1, 3)) is True + +def test_PythonRational__lt_le_gt_ge__(): + assert (QQ(1, 2) < QQ(1, 4)) is False + assert (QQ(1, 2) <= QQ(1, 4)) is False + assert (QQ(1, 2) > QQ(1, 4)) is True + assert (QQ(1, 2) >= QQ(1, 4)) is True + + assert (QQ(1, 4) < QQ(1, 2)) is True + assert (QQ(1, 4) <= QQ(1, 2)) is True + assert (QQ(1, 4) > QQ(1, 2)) is False + assert (QQ(1, 4) >= QQ(1, 2)) is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rationaltools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rationaltools.py new file mode 100644 index 0000000000000000000000000000000000000000..3ee0192a3fbc8997347df081663015afd91dd8ad --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rationaltools.py @@ -0,0 +1,63 @@ +"""Tests for tools for manipulation of rational expressions. """ + +from sympy.polys.rationaltools import together + +from sympy.core.mul import Mul +from sympy.core.numbers import Rational +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import sin +from sympy.integrals.integrals import Integral +from sympy.abc import x, y, z + +A, B = symbols('A,B', commutative=False) + + +def test_together(): + assert together(0) == 0 + assert together(1) == 1 + + assert together(x*y*z) == x*y*z + assert together(x + y) == x + y + + assert together(1/x) == 1/x + + assert together(1/x + 1) == (x + 1)/x + assert together(1/x + 3) == (3*x + 1)/x + assert together(1/x + x) == (x**2 + 1)/x + + assert together(1/x + S.Half) == (x + 2)/(2*x) + assert together(S.Half + x/2) == Mul(S.Half, x + 1, evaluate=False) + + assert together(1/x + 2/y) == (2*x + y)/(y*x) + assert together(1/(1 + 1/x)) == x/(1 + x) + assert together(x/(1 + 1/x)) == x**2/(1 + x) + + assert together(1/x + 1/y + 1/z) == (x*y + x*z + y*z)/(x*y*z) + assert together(1/(1 + x + 1/y + 1/z)) == y*z/(y + z + y*z + x*y*z) + + assert together(1/(x*y) + 1/(x*y)**2) == y**(-2)*x**(-2)*(1 + x*y) + assert together(1/(x*y) + 1/(x*y)**4) == y**(-4)*x**(-4)*(1 + x**3*y**3) + assert together(1/(x**7*y) + 1/(x*y)**4) == y**(-4)*x**(-7)*(x**3 + y**3) + + assert together(5/(2 + 6/(3 + 7/(4 + 8/(5 + 9/x))))) == \ + Rational(5, 2)*((171 + 119*x)/(279 + 203*x)) + + assert together(1 + 1/(x + 1)**2) == (1 + (x + 1)**2)/(x + 1)**2 + assert together(1 + 1/(x*(1 + x))) == (1 + x*(1 + x))/(x*(1 + x)) + assert together( + 1/(x*(x + 1)) + 1/(x*(x + 2))) == (3 + 2*x)/(x*(1 + x)*(2 + x)) + assert together(1 + 1/(2*x + 2)**2) == (4*(x + 1)**2 + 1)/(4*(x + 1)**2) + + assert together(sin(1/x + 1/y)) == sin(1/x + 1/y) + assert together(sin(1/x + 1/y), deep=True) == sin((x + y)/(x*y)) + + assert together(1/exp(x) + 1/(x*exp(x))) == (1 + x)/(x*exp(x)) + assert together(1/exp(2*x) + 1/(x*exp(3*x))) == (1 + exp(x)*x)/(x*exp(3*x)) + + assert together(Integral(1/x + 1/y, x)) == Integral((x + y)/(x*y), x) + assert together(Eq(1/x + 1/y, 1 + 1/z)) == Eq((x + y)/(x*y), (z + 1)/z) + + assert together((A*B)**-1 + (B*A)**-1) == (A*B)**-1 + (B*A)**-1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_ring_series.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_ring_series.py new file mode 100644 index 0000000000000000000000000000000000000000..d983fc99f8ffcf9361d8d069f1d381928ac0aada --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_ring_series.py @@ -0,0 +1,831 @@ +from sympy.polys.domains import ZZ, QQ, EX, RR +from sympy.polys.rings import ring +from sympy.polys.puiseux import puiseux_ring +from sympy.polys.ring_series import (_invert_monoms, rs_integrate, + rs_trunc, rs_mul, rs_square, rs_pow, _has_constant_term, rs_hadamard_exp, + rs_series_from_list, rs_exp, rs_log, rs_newton, rs_series_inversion, + rs_compose_add, rs_asin, _atan, rs_atan, _atanh, rs_atanh, rs_asinh, rs_tan, + rs_cot, rs_sin, rs_cos, rs_cos_sin, rs_sinh, rs_cosh, rs_cosh_sinh, rs_tanh, + _tan1, rs_fun, rs_nth_root, rs_LambertW, rs_series_reversion, rs_is_puiseux, + rs_series) +from sympy.testing.pytest import raises, slow +from sympy.core.symbol import symbols +from sympy.functions import (sin, cos, exp, tan, cot, sinh, cosh, atan, atanh, + asinh, tanh, log, sqrt) +from sympy.core.numbers import Rational, pi +from sympy.core import expand, S + +def is_close(a, b): + tol = 10**(-10) + assert abs(a - b) < tol + + +def test_ring_series1(): + R, x = ring('x', QQ) + p = x**4 + 2*x**3 + 3*x + 4 + assert _invert_monoms(p) == 4*x**4 + 3*x**3 + 2*x + 1 + assert rs_hadamard_exp(p) == x**4/24 + x**3/3 + 3*x + 4 + R, x = ring('x', QQ) + p = x**4 + 2*x**3 + 3*x + 4 + assert rs_integrate(p, x) == x**5/5 + x**4/2 + 3*x**2/2 + 4*x + R, x, y = ring('x, y', QQ) + p = x**2*y**2 + x + 1 + assert rs_integrate(p, x) == x**3*y**2/3 + x**2/2 + x + assert rs_integrate(p, y) == x**2*y**3/3 + x*y + y + + +def test_trunc(): + R, x, y, t = ring('x, y, t', QQ) + p = (y + t*x)**4 + p1 = rs_trunc(p, x, 3) + assert p1 == y**4 + 4*y**3*t*x + 6*y**2*t**2*x**2 + + +def test_mul_trunc(): + R, x, y, t = ring('x, y, t', QQ) + p = 1 + t*x + t*y + for i in range(2): + p = rs_mul(p, p, t, 3) + + assert p == 6*x**2*t**2 + 12*x*y*t**2 + 6*y**2*t**2 + 4*x*t + 4*y*t + 1 + p = 1 + t*x + t*y + t**2*x*y + p1 = rs_mul(p, p, t, 2) + assert p1 == 1 + 2*t*x + 2*t*y + R1, z = ring('z', QQ) + raises(ValueError, lambda: rs_mul(p, z, x, 2)) + + p1 = 2 + 2*x + 3*x**2 + p2 = 3 + x**2 + assert rs_mul(p1, p2, x, 4) == 2*x**3 + 11*x**2 + 6*x + 6 + + +def test_square_trunc(): + R, x, y, t = ring('x, y, t', QQ) + p = (1 + t*x + t*y)*2 + p1 = rs_mul(p, p, x, 3) + p2 = rs_square(p, x, 3) + assert p1 == p2 + p = 1 + x + x**2 + x**3 + assert rs_square(p, x, 4) == 4*x**3 + 3*x**2 + 2*x + 1 + + +def test_pow_trunc(): + R, x, y, z = ring('x, y, z', QQ) + p0 = y + x*z + p = p0**16 + for xx in (x, y, z): + p1 = rs_trunc(p, xx, 8) + p2 = rs_pow(p0, 16, xx, 8) + assert p1 == p2 + + p = 1 + x + p1 = rs_pow(p, 3, x, 2) + assert p1 == 1 + 3*x + assert rs_pow(p, 0, x, 2) == 1 + assert rs_pow(p, -2, x, 2) == 1 - 2*x + p = x + y + assert rs_pow(p, 3, y, 3) == x**3 + 3*x**2*y + 3*x*y**2 + assert rs_pow(1 + x, Rational(2, 3), x, 4) == 4*x**3/81 - x**2/9 + x*Rational(2, 3) + 1 + + +def test_has_constant_term(): + R, x, y, z = ring('x, y, z', QQ) + p = y + x*z + assert _has_constant_term(p, x) + p = x + x**4 + assert not _has_constant_term(p, x) + p = 1 + x + x**4 + assert _has_constant_term(p, x) + p = x + y + x*z + + +def test_inversion(): + R, x = ring('x', QQ) + p = 2 + x + 2*x**2 + n = 5 + p1 = rs_series_inversion(p, x, n) + assert rs_trunc(p*p1, x, n) == 1 + R, x, y = ring('x, y', QQ) + p = 2 + x + 2*x**2 + y*x + x**2*y + p1 = rs_series_inversion(p, x, n) + assert rs_trunc(p*p1, x, n) == 1 + + R, x, y = ring('x, y', QQ) + p = 1 + x + y + raises(NotImplementedError, lambda: rs_series_inversion(p, x, 4)) + p = R.zero + raises(ZeroDivisionError, lambda: rs_series_inversion(p, x, 3)) + + R, x = ring('x', ZZ) + p = 2 + x + raises(ValueError, lambda: rs_series_inversion(p, x, 3)) + + +def test_series_reversion(): + R, x, y = ring('x, y', QQ) + + p = rs_tan(x, x, 10) + assert rs_series_reversion(p, x, 8, y) == rs_atan(y, y, 8) + + p = rs_sin(x, x, 10) + assert rs_series_reversion(p, x, 8, y) == 5*y**7/112 + 3*y**5/40 + \ + y**3/6 + y + + +def test_series_from_list(): + R, x = ring('x', QQ) + p = 1 + 2*x + x**2 + 3*x**3 + c = [1, 2, 0, 4, 4] + r = rs_series_from_list(p, c, x, 5) + pc = R.from_list(list(reversed(c))) + r1 = rs_trunc(pc.compose(x, p), x, 5) + assert r == r1 + R, x, y = ring('x, y', QQ) + c = [1, 3, 5, 7] + p1 = rs_series_from_list(x + y, c, x, 3, concur=0) + p2 = rs_trunc((1 + 3*(x+y) + 5*(x+y)**2 + 7*(x+y)**3), x, 3) + assert p1 == p2 + + R, x = ring('x', QQ) + h = 25 + p = rs_exp(x, x, h) - 1 + p1 = rs_series_from_list(p, c, x, h) + p2 = 0 + for i, cx in enumerate(c): + p2 += cx*rs_pow(p, i, x, h) + assert p1 == p2 + + +def test_log(): + R, x = ring('x', QQ) + p = 1 + x + assert rs_log(p, x, 4) == x - x**2/2 + x**3/3 + p = 1 + x +2*x**2/3 + p1 = rs_log(p, x, 9) + assert p1 == -17*x**8/648 + 13*x**7/189 - 11*x**6/162 - x**5/45 + \ + 7*x**4/36 - x**3/3 + x**2/6 + x + p2 = rs_series_inversion(p, x, 9) + p3 = rs_log(p2, x, 9) + assert p3 == -p1 + + R, x, y = ring('x, y', QQ) + p = 1 + x + 2*y*x**2 + p1 = rs_log(p, x, 6) + assert p1 == (4*x**5*y**2 - 2*x**5*y - 2*x**4*y**2 + x**5/5 + 2*x**4*y - + x**4/4 - 2*x**3*y + x**3/3 + 2*x**2*y - x**2/2 + x) + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', EX) + assert rs_log(x + a, x, 5) == -EX(1/(4*a**4))*x**4 + EX(1/(3*a**3))*x**3 \ + - EX(1/(2*a**2))*x**2 + EX(1/a)*x + EX(log(a)) + assert rs_log(x + x**2*y + a, x, 4) == -EX(a**(-2))*x**3*y + \ + EX(1/(3*a**3))*x**3 + EX(1/a)*x**2*y - EX(1/(2*a**2))*x**2 + \ + EX(1/a)*x + EX(log(a)) + + p = x + x**2 + 3 + assert rs_log(p, x, 10).compose(x, 5) == EX(log(3) + Rational(19281291595, 9920232)) + + +def test_exp(): + R, x = ring('x', QQ) + p = x + x**4 + for h in [10, 30]: + q = rs_series_inversion(1 + p, x, h) - 1 + p1 = rs_exp(q, x, h) + q1 = rs_log(p1, x, h) + assert q1 == q + p1 = rs_exp(p, x, 30) + assert p1.coeff(x**29) == QQ(74274246775059676726972369, 353670479749588078181744640000) + prec = 21 + p = rs_log(1 + x, x, prec) + p1 = rs_exp(p, x, prec) + assert p1 == x + 1 + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[exp(a), a]) + assert rs_exp(x + a, x, 5) == exp(a)*x**4/24 + exp(a)*x**3/6 + \ + exp(a)*x**2/2 + exp(a)*x + exp(a) + assert rs_exp(x + x**2*y + a, x, 5) == exp(a)*x**4*y**2/2 + \ + exp(a)*x**4*y/2 + exp(a)*x**4/24 + exp(a)*x**3*y + \ + exp(a)*x**3/6 + exp(a)*x**2*y + exp(a)*x**2/2 + exp(a)*x + exp(a) + + R, x, y = ring('x, y', EX) + assert rs_exp(x + a, x, 5) == EX(exp(a)/24)*x**4 + EX(exp(a)/6)*x**3 + \ + EX(exp(a)/2)*x**2 + EX(exp(a))*x + EX(exp(a)) + assert rs_exp(x + x**2*y + a, x, 5) == EX(exp(a)/2)*x**4*y**2 + \ + EX(exp(a)/2)*x**4*y + EX(exp(a)/24)*x**4 + EX(exp(a))*x**3*y + \ + EX(exp(a)/6)*x**3 + EX(exp(a))*x**2*y + EX(exp(a)/2)*x**2 + \ + EX(exp(a))*x + EX(exp(a)) + + +def test_newton(): + R, x = ring('x', QQ) + p = x**2 - 2 + r = rs_newton(p, x, 4) + assert r == 8*x**4 + 4*x**2 + 2 + + +def test_compose_add(): + R, x = ring('x', QQ) + p1 = x**3 - 1 + p2 = x**2 - 2 + assert rs_compose_add(p1, p2) == x**6 - 6*x**4 - 2*x**3 + 12*x**2 - 12*x - 7 + + +def test_fun(): + R, x, y = ring('x, y', QQ) + p = x*y + x**2*y**3 + x**5*y + assert rs_fun(p, rs_tan, x, 10) == rs_tan(p, x, 10) + assert rs_fun(p, _tan1, x, 10) == _tan1(p, x, 10) + + +def test_nth_root(): + R, x, y = puiseux_ring('x, y', QQ) + assert rs_nth_root(1 + x**2*y, 4, x, 10) == -77*x**8*y**4/2048 + \ + 7*x**6*y**3/128 - 3*x**4*y**2/32 + x**2*y/4 + 1 + assert rs_nth_root(1 + x*y + x**2*y**3, 3, x, 5) == -x**4*y**6/9 + \ + 5*x**4*y**5/27 - 10*x**4*y**4/243 - 2*x**3*y**4/9 + 5*x**3*y**3/81 + \ + x**2*y**3/3 - x**2*y**2/9 + x*y/3 + 1 + assert rs_nth_root(8*x, 3, x, 3) == 2*x**QQ(1, 3) + assert rs_nth_root(8*x + x**2 + x**3, 3, x, 3) == x**QQ(4,3)/12 + 2*x**QQ(1,3) + r = rs_nth_root(8*x + x**2*y + x**3, 3, x, 4) + assert r == -x**QQ(7,3)*y**2/288 + x**QQ(7,3)/12 + x**QQ(4,3)*y/12 + 2*x**QQ(1,3) + + # Constant term in series + a = symbols('a') + R, x, y = puiseux_ring('x, y', EX) + assert rs_nth_root(x + EX(a), 3, x, 4) == EX(5/(81*a**QQ(8, 3)))*x**3 - \ + EX(1/(9*a**QQ(5, 3)))*x**2 + EX(1/(3*a**QQ(2, 3)))*x + EX(a**QQ(1, 3)) + assert rs_nth_root(x**QQ(2, 3) + x**2*y + 5, 2, x, 3) == -EX(sqrt(5)/100)*\ + x**QQ(8, 3)*y - EX(sqrt(5)/16000)*x**QQ(8, 3) + EX(sqrt(5)/10)*x**2*y + \ + EX(sqrt(5)/2000)*x**2 - EX(sqrt(5)/200)*x**QQ(4, 3) + \ + EX(sqrt(5)/10)*x**QQ(2, 3) + EX(sqrt(5)) + + +def test_atan(): + R, x, y = ring('x, y', QQ) + assert rs_atan(x, x, 9) == -x**7/7 + x**5/5 - x**3/3 + x + assert rs_atan(x*y + x**2*y**3, x, 9) == 2*x**8*y**11 - x**8*y**9 + \ + 2*x**7*y**9 - x**7*y**7/7 - x**6*y**9/3 + x**6*y**7 - x**5*y**7 + \ + x**5*y**5/5 - x**4*y**5 - x**3*y**3/3 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', EX) + assert rs_atan(x + a, x, 5) == -EX((a**3 - a)/(a**8 + 4*a**6 + 6*a**4 + \ + 4*a**2 + 1))*x**4 + EX((3*a**2 - 1)/(3*a**6 + 9*a**4 + \ + 9*a**2 + 3))*x**3 - EX(a/(a**4 + 2*a**2 + 1))*x**2 + \ + EX(1/(a**2 + 1))*x + EX(atan(a)) + assert rs_atan(x + x**2*y + a, x, 4) == -EX(2*a/(a**4 + 2*a**2 + 1)) \ + *x**3*y + EX((3*a**2 - 1)/(3*a**6 + 9*a**4 + 9*a**2 + 3))*x**3 + \ + EX(1/(a**2 + 1))*x**2*y - EX(a/(a**4 + 2*a**2 + 1))*x**2 + EX(1/(a**2 \ + + 1))*x + EX(atan(a)) + + # Test for _atan faster for small and univariate series + R, x = ring('x', QQ) + p = x**2 + 2*x + assert _atan(p, x, 5) == rs_atan(p, x, 5) + + R, x = ring('x', EX) + p = x**2 + 2*x + assert _atan(p, x, 9) == rs_atan(p, x, 9) + + +def test_asin(): + R, x, y = ring('x, y', QQ) + assert rs_asin(x + x*y, x, 5) == x**3*y**3/6 + x**3*y**2/2 + x**3*y/2 + \ + x**3/6 + x*y + x + assert rs_asin(x*y + x**2*y**3, x, 6) == x**5*y**7/2 + 3*x**5*y**5/40 + \ + x**4*y**5/2 + x**3*y**3/6 + x**2*y**3 + x*y + + +def test_tan(): + R, x, y = ring('x, y', QQ) + assert rs_tan(x, x, 9) == x + x**3/3 + QQ(2,15)*x**5 + QQ(17,315)*x**7 + assert rs_tan(x*y + x**2*y**3, x, 9) == 4*x**8*y**11/3 + 17*x**8*y**9/45 + \ + 4*x**7*y**9/3 + 17*x**7*y**7/315 + x**6*y**9/3 + 2*x**6*y**7/3 + \ + x**5*y**7 + 2*x**5*y**5/15 + x**4*y**5 + x**3*y**3/3 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[tan(a), a]) + assert rs_tan(x + a, x, 5) == (tan(a)**5 + 5*tan(a)**3/3 + + 2*tan(a)/3)*x**4 + (tan(a)**4 + 4*tan(a)**2/3 + Rational(1, 3))*x**3 + \ + (tan(a)**3 + tan(a))*x**2 + (tan(a)**2 + 1)*x + tan(a) + assert rs_tan(x + x**2*y + a, x, 4) == (2*tan(a)**3 + 2*tan(a))*x**3*y + \ + (tan(a)**4 + Rational(4, 3)*tan(a)**2 + Rational(1, 3))*x**3 + (tan(a)**2 + 1)*x**2*y + \ + (tan(a)**3 + tan(a))*x**2 + (tan(a)**2 + 1)*x + tan(a) + + R, x, y = ring('x, y', EX) + assert rs_tan(x + a, x, 5) == EX(tan(a)**5 + 5*tan(a)**3/3 + + 2*tan(a)/3)*x**4 + EX(tan(a)**4 + 4*tan(a)**2/3 + EX(1)/3)*x**3 + \ + EX(tan(a)**3 + tan(a))*x**2 + EX(tan(a)**2 + 1)*x + EX(tan(a)) + assert rs_tan(x + x**2*y + a, x, 4) == EX(2*tan(a)**3 + + 2*tan(a))*x**3*y + EX(tan(a)**4 + 4*tan(a)**2/3 + EX(1)/3)*x**3 + \ + EX(tan(a)**2 + 1)*x**2*y + EX(tan(a)**3 + tan(a))*x**2 + \ + EX(tan(a)**2 + 1)*x + EX(tan(a)) + + p = x + x**2 + 5 + assert rs_atan(p, x, 10).compose(x, 10) == EX(atan(5) + S(67701870330562640) / \ + 668083460499) + + +def test_cot(): + R, x, y = puiseux_ring('x, y', QQ) + assert rs_cot(x**6 + x**7, x, 8) == x**(-6) - x**(-5) + x**(-4) - \ + x**(-3) + x**(-2) - x**(-1) + 1 - x + x**2 - x**3 + x**4 - x**5 + \ + 2*x**6/3 - 4*x**7/3 + assert rs_cot(x + x**2*y, x, 5) == -x**4*y**5 - x**4*y/15 + x**3*y**4 - \ + x**3/45 - x**2*y**3 - x**2*y/3 + x*y**2 - x/3 - y + x**(-1) + + +def test_sin(): + R, x, y = ring('x, y', QQ) + assert rs_sin(x, x, 9) == x - x**3/6 + x**5/120 - x**7/5040 + assert rs_sin(x*y + x**2*y**3, x, 9) == x**8*y**11/12 - \ + x**8*y**9/720 + x**7*y**9/12 - x**7*y**7/5040 - x**6*y**9/6 + \ + x**6*y**7/24 - x**5*y**7/2 + x**5*y**5/120 - x**4*y**5/2 - \ + x**3*y**3/6 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[sin(a), cos(a), a]) + assert rs_sin(x + a, x, 5) == sin(a)*x**4/24 - cos(a)*x**3/6 - \ + sin(a)*x**2/2 + cos(a)*x + sin(a) + assert rs_sin(x + x**2*y + a, x, 5) == -sin(a)*x**4*y**2/2 - \ + cos(a)*x**4*y/2 + sin(a)*x**4/24 - sin(a)*x**3*y - cos(a)*x**3/6 + \ + cos(a)*x**2*y - sin(a)*x**2/2 + cos(a)*x + sin(a) + + R, x, y = ring('x, y', EX) + assert rs_sin(x + a, x, 5) == EX(sin(a)/24)*x**4 - EX(cos(a)/6)*x**3 - \ + EX(sin(a)/2)*x**2 + EX(cos(a))*x + EX(sin(a)) + assert rs_sin(x + x**2*y + a, x, 5) == -EX(sin(a)/2)*x**4*y**2 - \ + EX(cos(a)/2)*x**4*y + EX(sin(a)/24)*x**4 - EX(sin(a))*x**3*y - \ + EX(cos(a)/6)*x**3 + EX(cos(a))*x**2*y - EX(sin(a)/2)*x**2 + \ + EX(cos(a))*x + EX(sin(a)) + + +def test_cos(): + R, x, y = ring('x, y', QQ) + assert rs_cos(x, x, 9) == 1 - x**2/2 + x**4/24 - x**6/720 + x**8/40320 + assert rs_cos(x*y + x**2*y**3, x, 9) == x**8*y**12/24 - \ + x**8*y**10/48 + x**8*y**8/40320 + x**7*y**10/6 - \ + x**7*y**8/120 + x**6*y**8/4 - x**6*y**6/720 + x**5*y**6/6 - \ + x**4*y**6/2 + x**4*y**4/24 - x**3*y**4 - x**2*y**2/2 + 1 + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[sin(a), cos(a), a]) + assert rs_cos(x + a, x, 5) == cos(a)*x**4/24 + sin(a)*x**3/6 - \ + cos(a)*x**2/2 - sin(a)*x + cos(a) + assert rs_cos(x + x**2*y + a, x, 5) == -cos(a)*x**4*y**2/2 + \ + sin(a)*x**4*y/2 + cos(a)*x**4/24 - cos(a)*x**3*y + sin(a)*x**3/6 - \ + sin(a)*x**2*y - cos(a)*x**2/2 - sin(a)*x + cos(a) + + R, x, y = ring('x, y', EX) + assert rs_cos(x + a, x, 5) == EX(cos(a)/24)*x**4 + EX(sin(a)/6)*x**3 - \ + EX(cos(a)/2)*x**2 - EX(sin(a))*x + EX(cos(a)) + assert rs_cos(x + x**2*y + a, x, 5) == -EX(cos(a)/2)*x**4*y**2 + \ + EX(sin(a)/2)*x**4*y + EX(cos(a)/24)*x**4 - EX(cos(a))*x**3*y + \ + EX(sin(a)/6)*x**3 - EX(sin(a))*x**2*y - EX(cos(a)/2)*x**2 - \ + EX(sin(a))*x + EX(cos(a)) + + +def test_cos_sin(): + R, x, y = ring('x, y', QQ) + c, s = rs_cos_sin(x, x, 9) + assert c == rs_cos(x, x, 9) + assert s == rs_sin(x, x, 9) + c, s = rs_cos_sin(x + x*y, x, 5) + assert c == rs_cos(x + x*y, x, 5) + assert s == rs_sin(x + x*y, x, 5) + + # constant term in series + c, s = rs_cos_sin(1 + x + x**2, x, 5) + assert c == rs_cos(1 + x + x**2, x, 5) + assert s == rs_sin(1 + x + x**2, x, 5) + + a = symbols('a') + R, x, y = ring('x, y', QQ[sin(a), cos(a), a]) + c, s = rs_cos_sin(x + a, x, 5) + assert c == rs_cos(x + a, x, 5) + assert s == rs_sin(x + a, x, 5) + + R, x, y = ring('x, y', EX) + c, s = rs_cos_sin(x + a, x, 5) + assert c == rs_cos(x + a, x, 5) + assert s == rs_sin(x + a, x, 5) + + +def test_atanh(): + R, x, y = ring('x, y', QQ) + assert rs_atanh(x, x, 9) == x + x**3/3 + x**5/5 + x**7/7 + assert rs_atanh(x*y + x**2*y**3, x, 9) == 2*x**8*y**11 + x**8*y**9 + \ + 2*x**7*y**9 + x**7*y**7/7 + x**6*y**9/3 + x**6*y**7 + x**5*y**7 + \ + x**5*y**5/5 + x**4*y**5 + x**3*y**3/3 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', EX) + assert rs_atanh(x + a, x, 5) == EX((a**3 + a)/(a**8 - 4*a**6 + 6*a**4 - \ + 4*a**2 + 1))*x**4 - EX((3*a**2 + 1)/(3*a**6 - 9*a**4 + \ + 9*a**2 - 3))*x**3 + EX(a/(a**4 - 2*a**2 + 1))*x**2 - EX(1/(a**2 - \ + 1))*x + EX(atanh(a)) + assert rs_atanh(x + x**2*y + a, x, 4) == EX(2*a/(a**4 - 2*a**2 + \ + 1))*x**3*y - EX((3*a**2 + 1)/(3*a**6 - 9*a**4 + 9*a**2 - 3))*x**3 - \ + EX(1/(a**2 - 1))*x**2*y + EX(a/(a**4 - 2*a**2 + 1))*x**2 - \ + EX(1/(a**2 - 1))*x + EX(atanh(a)) + + p = x + x**2 + 5 + assert rs_atanh(p, x, 10).compose(x, 10) == EX(Rational(-733442653682135, 5079158784) \ + + atanh(5)) + + # Test for _atanh faster for small and univariate series + R,x = ring('x', QQ) + p = x**2 + 2*x + assert _atanh(p, x, 5) == rs_atanh(p, x, 5) + + R,x = ring('x', EX) + p = x**2 + 2*x + assert _atanh(p, x, 9) == rs_atanh(p, x, 9) + + +def test_asinh(): + R, x, y = ring('x, y', QQ) + assert rs_asinh(x, x, 9) == -5/112*x**7 + 3/40*x**5 - 1/6*x**3 + x + assert rs_asinh(x*y + x**2*y**3, x, 9) == 3/4*x**8*y**11 - 5/16*x**8*y**9 + \ + 3/4*x**7*y**9 - 5/112*x**7*y**7 - 1/6*x**6*y**9 + 3/8*x**6*y**7 - 1/2*x \ + **5*y**7 + 3/40*x**5*y**5 - 1/2*x**4*y**5 - 1/6*x**3*y**3 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', EX) + assert rs_asinh(x + a, x, 3) == -EX(a/(2*a**2*sqrt(a**2 + 1) + 2*sqrt(a**2 + 1))) \ + *x**2 + EX(1/sqrt(a**2 + 1))*x + EX(asinh(a)) + assert rs_asinh(x + x**2*y + a, x, 3) == EX(1/sqrt(a**2 + 1))*x**2*y - EX(a/(2*a**2 \ + *sqrt(a**2 + 1) + 2*sqrt(a**2 + 1)))*x**2 + EX(1/sqrt(a**2 + 1))*x + EX(asinh(a)) + + p = x + x ** 2 + 5 + assert rs_asinh(p, x, 10).compose(x, 10) == EX(asinh(5) + 4643789843094995*sqrt(26)/\ + 205564141692) + + +def test_sinh(): + R, x, y = ring('x, y', QQ) + assert rs_sinh(x, x, 9) == x + x**3/6 + x**5/120 + x**7/5040 + assert rs_sinh(x*y + x**2*y**3, x, 9) == x**8*y**11/12 + \ + x**8*y**9/720 + x**7*y**9/12 + x**7*y**7/5040 + x**6*y**9/6 + \ + x**6*y**7/24 + x**5*y**7/2 + x**5*y**5/120 + x**4*y**5/2 + \ + x**3*y**3/6 + x**2*y**3 + x*y + + # constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[sinh(a), cosh(a), a]) + assert rs_sinh(x + a, x, 5) == 1/24*x**4*(sinh(a)) + 1/6*x**3*(cosh(a)) + 1/\ + 2*x**2*(sinh(a)) + x*(cosh(a)) + (sinh(a)) + assert rs_sinh(x + x**2*y + a, x, 5) == 1/2*(sinh(a))*x**4*y**2 + 1/2*(cosh(a))\ + *x**4*y + 1/24*(sinh(a))*x**4 + (sinh(a))*x**3*y + 1/6*(cosh(a))*x**3 + \ + (cosh(a))*x**2*y + 1/2*(sinh(a))*x**2 + (cosh(a))*x + (sinh(a)) + + R, x, y = ring('x, y', EX) + assert rs_sinh(x + a, x, 5) == EX(sinh(a)/24)*x**4 + EX(cosh(a)/6)*x**3 + \ + EX(sinh(a)/2)*x**2 + EX(cosh(a))*x + EX(sinh(a)) + assert rs_sinh(x + x**2*y + a, x, 5) == EX(sinh(a)/2)*x**4*y**2 + EX(cosh(a)/\ + 2)*x**4*y + EX(sinh(a)/24)*x**4 + EX(sinh(a))*x**3*y + EX(cosh(a)/6)*x**3 \ + + EX(cosh(a))*x**2*y + EX(sinh(a)/2)*x**2 + EX(cosh(a))*x + EX(sinh(a)) + + +def test_cosh(): + R, x, y = ring('x, y', QQ) + assert rs_cosh(x, x, 9) == 1 + x**2/2 + x**4/24 + x**6/720 + x**8/40320 + assert rs_cosh(x*y + x**2*y**3, x, 9) == x**8*y**12/24 + \ + x**8*y**10/48 + x**8*y**8/40320 + x**7*y**10/6 + \ + x**7*y**8/120 + x**6*y**8/4 + x**6*y**6/720 + x**5*y**6/6 + \ + x**4*y**6/2 + x**4*y**4/24 + x**3*y**4 + x**2*y**2/2 + 1 + + # constant term in series + a = symbols('a') + R, x, y = ring('x, y', QQ[sinh(a), cosh(a), a]) + assert rs_cosh(x + a, x, 5) == 1/24*(cosh(a))*x**4 + 1/6*(sinh(a))*x**3 + \ + 1/2*(cosh(a))*x**2 + (sinh(a))*x + (cosh(a)) + assert rs_cosh(x + x**2*y + a, x, 5) == 1/2*(cosh(a))*x**4*y**2 + 1/2*(sinh(a))\ + *x**4*y + 1/24*(cosh(a))*x**4 + (cosh(a))*x**3*y + 1/6*(sinh(a))*x**3 + \ + (sinh(a))*x**2*y + 1/2*(cosh(a))*x**2 + (sinh(a))*x + (cosh(a)) + R, x, y = ring('x, y', EX) + assert rs_cosh(x + a, x, 5) == EX(cosh(a)/24)*x**4 + EX(sinh(a)/6)*x**3 + \ + EX(cosh(a)/2)*x**2 + EX(sinh(a))*x + EX(cosh(a)) + assert rs_cosh(x + x**2*y + a, x, 5) == EX(cosh(a)/2)*x**4*y**2 + EX(sinh(a)/\ + 2)*x**4*y + EX(cosh(a)/24)*x**4 + EX(cosh(a))*x**3*y + EX(sinh(a)/6)*x**3 \ + + EX(sinh(a))*x**2*y + EX(cosh(a)/2)*x**2 + EX(sinh(a))*x + EX(cosh(a)) + + +def test_cosh_sinh(): + R, x, y = ring('x, y', QQ) + ch, sh = rs_cosh_sinh(x, x, 9) + assert ch == rs_cosh(x, x, 9) + assert sh == rs_sinh(x, x, 9) + ch, sh = rs_cosh_sinh(x + x*y, x, 5) + assert ch == rs_cosh(x + x*y, x, 5) + assert sh == rs_sinh(x + x*y, x, 5) + + # constant term in series + c, s = rs_cosh_sinh(1 + x + x**2, x, 5) + assert c == rs_cosh(1 + x + x**2, x, 5) + assert s == rs_sinh(1 + x + x**2, x, 5) + + a = symbols('a') + R, x, y = ring('x, y', QQ[sinh(a), cosh(a), a]) + ch, sh = rs_cosh_sinh(x + a, x, 5) + assert ch == rs_cosh(x + a, x, 5) + assert sh == rs_sinh(x + a, x, 5) + R, x, y = ring('x, y', EX) + ch, sh = rs_cosh_sinh(x + a, x, 5) + assert ch == rs_cosh(x + a, x, 5) + assert sh == rs_sinh(x + a, x, 5) + + +def test_tanh(): + R, x, y = ring('x, y', QQ) + assert rs_tanh(x, x, 9) == x - QQ(1,3)*x**3 + QQ(2,15)*x**5 - QQ(17,315)*x**7 + assert rs_tanh(x*y + x**2*y**3, x, 9) == 4*x**8*y**11/3 - \ + 17*x**8*y**9/45 + 4*x**7*y**9/3 - 17*x**7*y**7/315 - x**6*y**9/3 + \ + 2*x**6*y**7/3 - x**5*y**7 + 2*x**5*y**5/15 - x**4*y**5 - \ + x**3*y**3/3 + x**2*y**3 + x*y + + # Constant term in series + a = symbols('a') + R, x, y = ring('x, y', EX) + assert rs_tanh(x + a, x, 5) == EX(tanh(a)**5 - 5*tanh(a)**3/3 + + 2*tanh(a)/3)*x**4 + EX(-tanh(a)**4 + 4*tanh(a)**2/3 - QQ(1, 3))*x**3 + \ + EX(tanh(a)**3 - tanh(a))*x**2 + EX(-tanh(a)**2 + 1)*x + EX(tanh(a)) + + p = rs_tanh(x + x**2*y + a, x, 4) + assert (p.compose(x, 10)).compose(y, 5) == EX(-1000*tanh(a)**4 + \ + 10100*tanh(a)**3 + 2470*tanh(a)**2/3 - 10099*tanh(a) + QQ(530, 3)) + + +def test_RR(): + rs_funcs = [rs_sin, rs_cos, rs_tan, rs_cot, rs_atan, rs_tanh] + sympy_funcs = [sin, cos, tan, cot, atan, tanh] + R, x, y = ring('x, y', RR) + a = symbols('a') + for rs_func, sympy_func in zip(rs_funcs, sympy_funcs): + p = rs_func(2 + x, x, 5).compose(x, 5) + q = sympy_func(2 + a).series(a, 0, 5).removeO() + is_close(p.as_expr(), q.subs(a, 5).n()) + + p = rs_nth_root(2 + x, 5, x, 5).compose(x, 5) + q = ((2 + a)**QQ(1, 5)).series(a, 0, 5).removeO() + is_close(p.as_expr(), q.subs(a, 5).n()) + + +def test_is_regular(): + R, x, y = puiseux_ring('x, y', QQ) + p = 1 + 2*x + x**2 + 3*x**3 + assert not rs_is_puiseux(p, x) + + p = x + x**QQ(1,5)*y + assert rs_is_puiseux(p, x) + assert not rs_is_puiseux(p, y) + + p = x + x**2*y**QQ(1,5)*y + assert not rs_is_puiseux(p, x) + + +def test_puiseux(): + R, x, y = puiseux_ring('x, y', QQ) + p = x**QQ(2,5) + x**QQ(2,3) + x + + r = rs_series_inversion(p, x, 1) + r1 = -x**QQ(14,15) + x**QQ(4,5) - 3*x**QQ(11,15) + x**QQ(2,3) + \ + 2*x**QQ(7,15) - x**QQ(2,5) - x**QQ(1,5) + x**QQ(2,15) - x**QQ(-2,15) \ + + x**QQ(-2,5) + assert r == r1 + + r = rs_nth_root(1 + p, 3, x, 1) + assert r == -x**QQ(4,5)/9 + x**QQ(2,3)/3 + x**QQ(2,5)/3 + 1 + + r = rs_log(1 + p, x, 1) + assert r == -x**QQ(4,5)/2 + x**QQ(2,3) + x**QQ(2,5) + + r = rs_LambertW(p, x, 1) + assert r == -x**QQ(4,5) + x**QQ(2,3) + x**QQ(2,5) + + p1 = x + x**QQ(1,5)*y + r = rs_exp(p1, x, 1) + assert r == x**QQ(4,5)*y**4/24 + x**QQ(3,5)*y**3/6 + x**QQ(2,5)*y**2/2 + \ + x**QQ(1,5)*y + 1 + + r = rs_atan(p, x, 2) + assert r == -x**QQ(9,5) - x**QQ(26,15) - x**QQ(22,15) - x**QQ(6,5)/3 + \ + x + x**QQ(2,3) + x**QQ(2,5) + + r = rs_atan(p1, x, 2) + assert r == x**QQ(9,5)*y**9/9 + x**QQ(9,5)*y**4 - x**QQ(7,5)*y**7/7 - \ + x**QQ(7,5)*y**2 + x*y**5/5 + x - x**QQ(3,5)*y**3/3 + x**QQ(1,5)*y + + r = rs_tan(p, x, 2) + assert r == x**QQ(2,5) + x**QQ(2,3) + x + QQ(1,3)*x**QQ(6,5) + x**QQ(22,15)\ + + x**QQ(26,15) + x**QQ(9,5) + + r = rs_sin(p, x, 2) + assert r == x**QQ(2,5) + x**QQ(2,3) + x - QQ(1,6)*x**QQ(6,5) - QQ(1,2)*x**\ + QQ(22,15) - QQ(1,2)*x**QQ(26,15) - QQ(1,2)*x**QQ(9,5) + + r = rs_cos(p, x, 2) + assert r == 1 - QQ(1,2)*x**QQ(4,5) - x**QQ(16,15) - QQ(1,2)*x**QQ(4,3) - \ + x**QQ(7,5) + QQ(1,24)*x**QQ(8,5) - x**QQ(5,3) + QQ(1,6)*x**QQ(28,15) + + r = rs_asin(p, x, 2) + assert r == x**QQ(9,5)/2 + x**QQ(26,15)/2 + x**QQ(22,15)/2 + \ + x**QQ(6,5)/6 + x + x**QQ(2,3) + x**QQ(2,5) + + r = rs_cot(p, x, 1) + assert r == -x**QQ(14,15) + x**QQ(4,5) - 3*x**QQ(11,15) + \ + 2*x**QQ(2,3)/3 + 2*x**QQ(7,15) - 4*x**QQ(2,5)/3 - x**QQ(1,5) + \ + x**QQ(2,15) - x**QQ(-2,15) + x**QQ(-2,5) + + r = rs_cos_sin(p, x, 2) + assert r[0] == x**QQ(28,15)/6 - x**QQ(5,3) + x**QQ(8,5)/24 - x**QQ(7,5) - \ + x**QQ(4,3)/2 - x**QQ(16,15) - x**QQ(4,5)/2 + 1 + assert r[1] == -x**QQ(9,5)/2 - x**QQ(26,15)/2 - x**QQ(22,15)/2 - \ + x**QQ(6,5)/6 + x + x**QQ(2,3) + x**QQ(2,5) + + r = rs_atanh(p, x, 2) + assert r == x**QQ(9,5) + x**QQ(26,15) + x**QQ(22,15) + x**QQ(6,5)/3 + x + \ + x**QQ(2,3) + x**QQ(2,5) + + r = rs_asinh(p, x, 2) + assert r == x**QQ(2,5) + x**QQ(2,3) + x - QQ(1,6)*x**QQ(6,5) - QQ(1,2)*x**\ + QQ(22,15) - QQ(1,2)*x**QQ(26,15) - QQ(1,2)*x**QQ(9,5) + + r = rs_cosh(p, x, 2) + assert r == x**QQ(28,15)/6 + x**QQ(5,3) + x**QQ(8,5)/24 + x**QQ(7,5) + \ + x**QQ(4,3)/2 + x**QQ(16,15) + x**QQ(4,5)/2 + 1 + + r = rs_sinh(p, x, 2) + assert r == x**QQ(9,5)/2 + x**QQ(26,15)/2 + x**QQ(22,15)/2 + \ + x**QQ(6,5)/6 + x + x**QQ(2,3) + x**QQ(2,5) + + r = rs_cosh_sinh(p, x, 2) + assert r[0] == x**QQ(28,15)/6 + x**QQ(5,3) + x**QQ(8,5)/24 + x**QQ(7,5) + \ + x**QQ(4,3)/2 + x**QQ(16,15) + x**QQ(4,5)/2 + 1 + assert r[1] == x**QQ(9,5)/2 + x**QQ(26,15)/2 + x**QQ(22,15)/2 + \ + x**QQ(6,5)/6 + x + x**QQ(2,3) + x**QQ(2,5) + + r = rs_tanh(p, x, 2) + assert r == -x**QQ(9,5) - x**QQ(26,15) - x**QQ(22,15) - x**QQ(6,5)/3 + \ + x + x**QQ(2,3) + x**QQ(2,5) + + +def test_puiseux_algebraic(): # https://github.com/sympy/sympy/issues/24395 + + K = QQ.algebraic_field(sqrt(2)) + sqrt2 = K.from_sympy(sqrt(2)) + x, y = symbols('x, y') + R, xr, yr = puiseux_ring([x, y], K) + p = (1+sqrt2)*xr**QQ(1,2) + (1-sqrt2)*yr**QQ(2,3) + + assert p.to_dict() == {(QQ(1,2),QQ(0)):1+sqrt2, (QQ(0),QQ(2,3)):1-sqrt2} + assert p.as_expr() == (1 + sqrt(2))*x**(S(1)/2) + (1 - sqrt(2))*y**(S(2)/3) + + +def test1(): + R, x = puiseux_ring('x', QQ) + r = rs_sin(x, x, 15)*x**(-5) + assert r == x**8/6227020800 - x**6/39916800 + x**4/362880 - x**2/5040 + \ + QQ(1,120) - x**-2/6 + x**-4 + + p = rs_sin(x, x, 10) + r = rs_nth_root(p, 2, x, 10) + assert r == -67*x**QQ(17,2)/29030400 - x**QQ(13,2)/24192 + \ + x**QQ(9,2)/1440 - x**QQ(5,2)/12 + x**QQ(1,2) + + p = rs_sin(x, x, 10) + r = rs_nth_root(p, 7, x, 10) + r = rs_pow(r, 5, x, 10) + assert r == -97*x**QQ(61,7)/124467840 - x**QQ(47,7)/16464 + \ + 11*x**QQ(33,7)/3528 - 5*x**QQ(19,7)/42 + x**QQ(5,7) + + r = rs_exp(x**QQ(1,2), x, 10) + assert r == x**QQ(19,2)/121645100408832000 + x**9/6402373705728000 + \ + x**QQ(17,2)/355687428096000 + x**8/20922789888000 + \ + x**QQ(15,2)/1307674368000 + x**7/87178291200 + \ + x**QQ(13,2)/6227020800 + x**6/479001600 + x**QQ(11,2)/39916800 + \ + x**5/3628800 + x**QQ(9,2)/362880 + x**4/40320 + x**QQ(7,2)/5040 + \ + x**3/720 + x**QQ(5,2)/120 + x**2/24 + x**QQ(3,2)/6 + x/2 + \ + x**QQ(1,2) + 1 + + +def test_puiseux2(): + R, y = ring('y', QQ) + S, x = puiseux_ring('x', R.to_domain()) + + p = x + x**QQ(1,5)*y + r = rs_atan(p, x, 3) + assert r == (y**13/13 + y**8 + 2*y**3)*x**QQ(13,5) - (y**11/11 + y**6 + + y)*x**QQ(11,5) + (y**9/9 + y**4)*x**QQ(9,5) - (y**7/7 + + y**2)*x**QQ(7,5) + (y**5/5 + 1)*x - y**3*x**QQ(3,5)/3 + y*x**QQ(1,5) + + +@slow +def test_rs_series(): + x, a, b, c = symbols('x, a, b, c') + + assert rs_series(a, a, 5).as_expr() == a + assert rs_series(sin(a), a, 5).as_expr() == (sin(a).series(a, 0, + 5)).removeO() + assert rs_series(sin(a) + cos(a), a, 5).as_expr() == ((sin(a) + + cos(a)).series(a, 0, 5)).removeO() + assert rs_series(sin(a)*cos(a), a, 5).as_expr() == ((sin(a)* + cos(a)).series(a, 0, 5)).removeO() + + p = (sin(a) - a)*(cos(a**2) + a**4/2) + assert expand(rs_series(p, a, 10).as_expr()) == expand(p.series(a, 0, + 10).removeO()) + + p = sin(a**2/2 + a/3) + cos(a/5)*sin(a/2)**3 + assert expand(rs_series(p, a, 5).as_expr()) == expand(p.series(a, 0, + 5).removeO()) + + p = sin(x**2 + a)*(cos(x**3 - 1) - a - a**2) + assert expand(rs_series(p, a, 5).as_expr()) == expand(p.series(a, 0, + 5).removeO()) + + p = sin(a**2 - a/3 + 2)**5*exp(a**3 - a/2) + assert expand(rs_series(p, a, 10).as_expr()) == expand(p.series(a, 0, + 10).removeO()) + + p = sin(a + b + c) + assert expand(rs_series(p, a, 5).as_expr()) == expand(p.series(a, 0, + 5).removeO()) + + p = tan(sin(a**2 + 4) + b + c) + assert expand(rs_series(p, a, 6).as_expr()) == expand(p.series(a, 0, + 6).removeO()) + + p = a**QQ(2,5) + a**QQ(2,3) + a + + r = rs_series(tan(p), a, 2) + assert r.as_expr() == a**QQ(9,5) + a**QQ(26,15) + a**QQ(22,15) + a**QQ(6,5)/3 + \ + a + a**QQ(2,3) + a**QQ(2,5) + + r = rs_series(exp(p), a, 1) + assert r.as_expr() == a**QQ(4,5)/2 + a**QQ(2,3) + a**QQ(2,5) + 1 + + r = rs_series(sin(p), a, 2) + assert r.as_expr() == -a**QQ(9,5)/2 - a**QQ(26,15)/2 - a**QQ(22,15)/2 - \ + a**QQ(6,5)/6 + a + a**QQ(2,3) + a**QQ(2,5) + + r = rs_series(cos(p), a, 2) + assert r.as_expr() == a**QQ(28,15)/6 - a**QQ(5,3) + a**QQ(8,5)/24 - a**QQ(7,5) - \ + a**QQ(4,3)/2 - a**QQ(16,15) - a**QQ(4,5)/2 + 1 + + assert rs_series(sin(a)/7, a, 5).as_expr() == (sin(a)/7).series(a, 0, + 5).removeO() + + +def test_rs_series_ConstantInExpr(): + x, a = symbols('x a') + assert rs_series(log(1 + x), x, 5).as_expr() == -x**4/4 + x**3/3 - \ + x**2/2 + x + assert rs_series(log(1 + 4*x), x, 5).as_expr() == -64*x**4 + 64*x**3/3 - \ + 8*x**2 + 4*x + assert rs_series(log(1 + x + x**2), x, 10).as_expr() == -2*x**9/9 + \ + x**8/8 + x**7/7 - x**6/3 + x**5/5 + x**4/4 - 2*x**3/3 + x**2/2 + x + assert rs_series(log(1 + x*a**2), x, 7).as_expr() == -x**6*a**12/6 + \ + x**5*a**10/5 - x**4*a**8/4 + x**3*a**6/3 - x**2*a**4/2 + x*a**2 + + assert rs_series(atan(1 + x), x, 9).as_expr() == -x**7/112 + x**6/48 - x**5/40 \ + + x**3/12 - x**2/4 + x/2 + pi/4 + assert rs_series(atan(1 + x + x**2),x, 9).as_expr() == -15*x**7/112 - x**6/48 + \ + 9*x**5/40 - 5*x**3/12 + x**2/4 + x/2 + pi/4 + assert rs_series(atan(1 + x * a), x, 9).as_expr() == -a**7*x**7/112 + a**6*x**6/48 \ + - a**5*x**5/40 + a**3*x**3/12 - a**2*x**2/4 + a*x/2 + pi/4 + + assert rs_series(tanh(1 + x), x, 5).as_expr() == -5*x**4*tanh(1)**3/3 + x**4* \ + tanh(1)**5 + 2*x**4*tanh(1)/3 - x**3*tanh(1)**4 - x**3/3 + 4*x**3*tanh(1) \ + **2/3 - x**2*tanh(1) + x**2*tanh(1)**3 - x*tanh(1)**2 + x + tanh(1) + assert rs_series(tanh(1 + x * a), x, 3).as_expr() == -a**2*x**2*tanh(1) + a**2*x** \ + 2*tanh(1)**3 - a*x*tanh(1)**2 + a*x + tanh(1) + + assert rs_series(sinh(1 + x), x, 5).as_expr() == x**4*sinh(1)/24 + x**3*cosh(1)/6 + \ + x**2*sinh(1)/2 + x*cosh(1) + sinh(1) + assert rs_series(sinh(1 + x * a), x, 5).as_expr() == a**4*x**4*sinh(1)/24 + \ + a**3*x**3*cosh(1)/6 + a**2*x**2*sinh(1)/2 + a*x*cosh(1) + sinh(1) + + assert rs_series(cosh(1 + x), x, 5).as_expr() == x**4*cosh(1)/24 + x**3*sinh(1)/6 + \ + x**2*cosh(1)/2 + x*sinh(1) + cosh(1) + assert rs_series(cosh(1 + x * a), x, 5).as_expr() == a**4*x**4*cosh(1)/24 + \ + a**3*x**3*sinh(1)/6 + a**2*x**2*cosh(1)/2 + a*x*sinh(1) + cosh(1) + + +def test_issue(): + # https://github.com/sympy/sympy/issues/10191 + # https://github.com/sympy/sympy/issues/19543 + + a, b = symbols('a b') + assert rs_series(sin(a**QQ(3,7))*exp(a + b**QQ(6,7)), a,2).as_expr() == \ + a**QQ(10,7)*exp(b**QQ(6,7)) - a**QQ(9,7)*exp(b**QQ(6,7))/6 + a**QQ(3,7)*exp(b**QQ(6,7)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rings.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rings.py new file mode 100644 index 0000000000000000000000000000000000000000..455cc319908d0173737531b339e22def8e4a26fc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rings.py @@ -0,0 +1,1591 @@ +"""Test sparse polynomials. """ + +from functools import reduce +from operator import add, mul + +from sympy.polys.rings import ring, xring, sring, PolyRing, PolyElement +from sympy.polys.fields import field, FracField +from sympy.polys.densebasic import ninf +from sympy.polys.domains import ZZ, QQ, RR, FF, EX +from sympy.polys.orderings import lex, grlex +from sympy.polys.polyerrors import GeneratorsError, \ + ExactQuotientFailed, MultivariatePolynomialError, CoercionFailed + +from sympy.testing.pytest import raises +from sympy.core import Symbol, symbols +from sympy.core.singleton import S +from sympy.core.numbers import pi +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt + +def test_PolyRing___init__(): + x, y, z, t = map(Symbol, "xyzt") + + assert len(PolyRing("x,y,z", ZZ, lex).gens) == 3 + assert len(PolyRing(x, ZZ, lex).gens) == 1 + assert len(PolyRing(("x", "y", "z"), ZZ, lex).gens) == 3 + assert len(PolyRing((x, y, z), ZZ, lex).gens) == 3 + assert len(PolyRing("", ZZ, lex).gens) == 0 + assert len(PolyRing([], ZZ, lex).gens) == 0 + + raises(GeneratorsError, lambda: PolyRing(0, ZZ, lex)) + + assert PolyRing("x", ZZ[t], lex).domain == ZZ[t] + assert PolyRing("x", 'ZZ[t]', lex).domain == ZZ[t] + assert PolyRing("x", PolyRing("t", ZZ, lex), lex).domain == ZZ[t] + + raises(GeneratorsError, lambda: PolyRing("x", PolyRing("x", ZZ, lex), lex)) + + _lex = Symbol("lex") + assert PolyRing("x", ZZ, lex).order == lex + assert PolyRing("x", ZZ, _lex).order == lex + assert PolyRing("x", ZZ, 'lex').order == lex + + R1 = PolyRing("x,y", ZZ, lex) + R2 = PolyRing("x,y", ZZ, lex) + R3 = PolyRing("x,y,z", ZZ, lex) + + assert R1.x == R1.gens[0] + assert R1.y == R1.gens[1] + assert R1.x == R2.x + assert R1.y == R2.y + assert R1.x != R3.x + assert R1.y != R3.y + +def test_PolyRing___hash__(): + R, x, y, z = ring("x,y,z", QQ) + assert hash(R) + +def test_PolyRing___eq__(): + assert ring("x,y,z", QQ)[0] == ring("x,y,z", QQ)[0] + assert ring("x,y,z", QQ)[0] != ring("x,y,z", ZZ)[0] + assert ring("x,y,z", ZZ)[0] != ring("x,y,z", QQ)[0] + assert ring("x,y,z", QQ)[0] != ring("x,y", QQ)[0] + assert ring("x,y", QQ)[0] != ring("x,y,z", QQ)[0] + +def test_PolyRing_ring_new(): + R, x, y, z = ring("x,y,z", QQ) + + assert R.ring_new(7) == R(7) + assert R.ring_new(7*x*y*z) == 7*x*y*z + + f = x**2 + 2*x*y + 3*x + 4*z**2 + 5*z + 6 + + assert R.ring_new([[[1]], [[2], [3]], [[4, 5, 6]]]) == f + assert R.ring_new({(2, 0, 0): 1, (1, 1, 0): 2, (1, 0, 0): 3, (0, 0, 2): 4, (0, 0, 1): 5, (0, 0, 0): 6}) == f + assert R.ring_new([((2, 0, 0), 1), ((1, 1, 0), 2), ((1, 0, 0), 3), ((0, 0, 2), 4), ((0, 0, 1), 5), ((0, 0, 0), 6)]) == f + + R, = ring("", QQ) + assert R.ring_new([((), 7)]) == R(7) + +def test_PolyRing_drop(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R.drop(x) == PolyRing("y,z", ZZ, lex) + assert R.drop(y) == PolyRing("x,z", ZZ, lex) + assert R.drop(z) == PolyRing("x,y", ZZ, lex) + + assert R.drop(0) == PolyRing("y,z", ZZ, lex) + assert R.drop(0).drop(0) == PolyRing("z", ZZ, lex) + assert R.drop(0).drop(0).drop(0) == ZZ + + assert R.drop(1) == PolyRing("x,z", ZZ, lex) + + assert R.drop(2) == PolyRing("x,y", ZZ, lex) + assert R.drop(2).drop(1) == PolyRing("x", ZZ, lex) + assert R.drop(2).drop(1).drop(0) == ZZ + + raises(ValueError, lambda: R.drop(3)) + raises(ValueError, lambda: R.drop(x).drop(y)) + +def test_PolyRing___getitem__(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R[0:] == PolyRing("x,y,z", ZZ, lex) + assert R[1:] == PolyRing("y,z", ZZ, lex) + assert R[2:] == PolyRing("z", ZZ, lex) + assert R[3:] == ZZ + +def test_PolyRing_is_(): + R = PolyRing("x", QQ, lex) + + assert R.is_univariate is True + assert R.is_multivariate is False + + R = PolyRing("x,y,z", QQ, lex) + + assert R.is_univariate is False + assert R.is_multivariate is True + + R = PolyRing("", QQ, lex) + + assert R.is_univariate is False + assert R.is_multivariate is False + +def test_PolyRing_add(): + R, x = ring("x", ZZ) + F = [ x**2 + 2*i + 3 for i in range(4) ] + + assert R.add(F) == reduce(add, F) == 4*x**2 + 24 + + R, = ring("", ZZ) + + assert R.add([2, 5, 7]) == 14 + +def test_PolyRing_mul(): + R, x = ring("x", ZZ) + F = [ x**2 + 2*i + 3 for i in range(4) ] + + assert R.mul(F) == reduce(mul, F) == x**8 + 24*x**6 + 206*x**4 + 744*x**2 + 945 + + R, = ring("", ZZ) + + assert R.mul([2, 3, 5]) == 30 + +def test_PolyRing_symmetric_poly(): + R, x, y, z, t = ring("x,y,z,t", ZZ) + + raises(ValueError, lambda: R.symmetric_poly(-1)) + raises(ValueError, lambda: R.symmetric_poly(5)) + + assert R.symmetric_poly(0) == R.one + assert R.symmetric_poly(1) == x + y + z + t + assert R.symmetric_poly(2) == x*y + x*z + x*t + y*z + y*t + z*t + assert R.symmetric_poly(3) == x*y*z + x*y*t + x*z*t + y*z*t + assert R.symmetric_poly(4) == x*y*z*t + +def test_sring(): + x, y, z, t = symbols("x,y,z,t") + + R = PolyRing("x,y,z", ZZ, lex) + assert sring(x + 2*y + 3*z) == (R, R.x + 2*R.y + 3*R.z) + + R = PolyRing("x,y,z", QQ, lex) + assert sring(x + 2*y + z/3) == (R, R.x + 2*R.y + R.z/3) + assert sring([x, 2*y, z/3]) == (R, [R.x, 2*R.y, R.z/3]) + + Rt = PolyRing("t", ZZ, lex) + R = PolyRing("x,y,z", Rt, lex) + assert sring(x + 2*t*y + 3*t**2*z, x, y, z) == (R, R.x + 2*Rt.t*R.y + 3*Rt.t**2*R.z) + + Rt = PolyRing("t", QQ, lex) + R = PolyRing("x,y,z", Rt, lex) + assert sring(x + t*y/2 + t**2*z/3, x, y, z) == (R, R.x + Rt.t*R.y/2 + Rt.t**2*R.z/3) + + Rt = FracField("t", ZZ, lex) + R = PolyRing("x,y,z", Rt, lex) + assert sring(x + 2*y/t + t**2*z/3, x, y, z) == (R, R.x + 2*R.y/Rt.t + Rt.t**2*R.z/3) + + r = sqrt(2) - sqrt(3) + R, a = sring(r, extension=True) + assert R.domain == QQ.algebraic_field(sqrt(2) + sqrt(3)) + assert R.gens == () + assert a == R.domain.from_sympy(r) + +def test_PolyElement___hash__(): + R, x, y, z = ring("x,y,z", QQ) + assert hash(x*y*z) + +def test_PolyElement___eq__(): + R, x, y = ring("x,y", ZZ, lex) + + assert ((x*y + 5*x*y) == 6) == False + assert ((x*y + 5*x*y) == 6*x*y) == True + assert (6 == (x*y + 5*x*y)) == False + assert (6*x*y == (x*y + 5*x*y)) == True + + assert ((x*y - x*y) == 0) == True + assert (0 == (x*y - x*y)) == True + + assert ((x*y - x*y) == 1) == False + assert (1 == (x*y - x*y)) == False + + assert ((x*y - x*y) == 1) == False + assert (1 == (x*y - x*y)) == False + + assert ((x*y + 5*x*y) != 6) == True + assert ((x*y + 5*x*y) != 6*x*y) == False + assert (6 != (x*y + 5*x*y)) == True + assert (6*x*y != (x*y + 5*x*y)) == False + + assert ((x*y - x*y) != 0) == False + assert (0 != (x*y - x*y)) == False + + assert ((x*y - x*y) != 1) == True + assert (1 != (x*y - x*y)) == True + + assert R.one == QQ(1, 1) == R.one + assert R.one == 1 == R.one + + Rt, t = ring("t", ZZ) + R, x, y = ring("x,y", Rt) + + assert (t**3*x/x == t**3) == True + assert (t**3*x/x == t**4) == False + +def test_PolyElement__lt_le_gt_ge__(): + R, x, y = ring("x,y", ZZ) + + assert R(1) < x < x**2 < x**3 + assert R(1) <= x <= x**2 <= x**3 + + assert x**3 > x**2 > x > R(1) + assert x**3 >= x**2 >= x >= R(1) + +def test_PolyElement__str__(): + x, y = symbols('x, y') + + for dom in [ZZ, QQ, ZZ[x], ZZ[x,y], ZZ[x][y]]: + R, t = ring('t', dom) + assert str(2*t**2 + 1) == '2*t**2 + 1' + + for dom in [EX, EX[x]]: + R, t = ring('t', dom) + assert str(2*t**2 + 1) == 'EX(2)*t**2 + EX(1)' + +def test_PolyElement_copy(): + R, x, y, z = ring("x,y,z", ZZ) + + f = x*y + 3*z + g = f.copy() + + assert f == g + g[(1, 1, 1)] = 7 + assert f != g + +def test_PolyElement_as_expr(): + R, x, y, z = ring("x,y,z", ZZ) + f = 3*x**2*y - x*y*z + 7*z**3 + 1 + + X, Y, Z = R.symbols + g = 3*X**2*Y - X*Y*Z + 7*Z**3 + 1 + + assert f != g + assert f.as_expr() == g + + U, V, W = symbols("u,v,w") + g = 3*U**2*V - U*V*W + 7*W**3 + 1 + + assert f != g + assert f.as_expr(U, V, W) == g + + raises(ValueError, lambda: f.as_expr(X)) + + R, = ring("", ZZ) + assert R(3).as_expr() == 3 + +def test_PolyElement_from_expr(): + x, y, z = symbols("x,y,z") + R, X, Y, Z = ring((x, y, z), ZZ) + + f = R.from_expr(1) + assert f == 1 and R.is_element(f) + + f = R.from_expr(x) + assert f == X and R.is_element(f) + + f = R.from_expr(x*y*z) + assert f == X*Y*Z and R.is_element(f) + + f = R.from_expr(x*y*z + x*y + x) + assert f == X*Y*Z + X*Y + X and R.is_element(f) + + f = R.from_expr(x**3*y*z + x**2*y**7 + 1) + assert f == X**3*Y*Z + X**2*Y**7 + 1 and R.is_element(f) + + r, F = sring([exp(2)]) + f = r.from_expr(exp(2)) + assert f == F[0] and r.is_element(f) + + raises(ValueError, lambda: R.from_expr(1/x)) + raises(ValueError, lambda: R.from_expr(2**x)) + raises(ValueError, lambda: R.from_expr(7*x + sqrt(2))) + + R, = ring("", ZZ) + f = R.from_expr(1) + assert f == 1 and R.is_element(f) + +def test_PolyElement_degree(): + R, x,y,z = ring("x,y,z", ZZ) + + assert ninf == float('-inf') + + assert R(0).degree() is ninf + assert R(1).degree() == 0 + assert (x + 1).degree() == 1 + assert (2*y**3 + z).degree() == 0 + assert (x*y**3 + z).degree() == 1 + assert (x**5*y**3 + z).degree() == 5 + + assert R(0).degree(x) is ninf + assert R(1).degree(x) == 0 + assert (x + 1).degree(x) == 1 + assert (2*y**3 + z).degree(x) == 0 + assert (x*y**3 + z).degree(x) == 1 + assert (7*x**5*y**3 + z).degree(x) == 5 + + assert R(0).degree(y) is ninf + assert R(1).degree(y) == 0 + assert (x + 1).degree(y) == 0 + assert (2*y**3 + z).degree(y) == 3 + assert (x*y**3 + z).degree(y) == 3 + assert (7*x**5*y**3 + z).degree(y) == 3 + + assert R(0).degree(z) is ninf + assert R(1).degree(z) == 0 + assert (x + 1).degree(z) == 0 + assert (2*y**3 + z).degree(z) == 1 + assert (x*y**3 + z).degree(z) == 1 + assert (7*x**5*y**3 + z).degree(z) == 1 + + R, = ring("", ZZ) + assert R(0).degree() is ninf + assert R(1).degree() == 0 + +def test_PolyElement_tail_degree(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R(0).tail_degree() is ninf + assert R(1).tail_degree() == 0 + assert (x + 1).tail_degree() == 0 + assert (2*y**3 + x**3*z).tail_degree() == 0 + assert (x*y**3 + x**3*z).tail_degree() == 1 + assert (x**5*y**3 + x**3*z).tail_degree() == 3 + + assert R(0).tail_degree(x) is ninf + assert R(1).tail_degree(x) == 0 + assert (x + 1).tail_degree(x) == 0 + assert (2*y**3 + x**3*z).tail_degree(x) == 0 + assert (x*y**3 + x**3*z).tail_degree(x) == 1 + assert (7*x**5*y**3 + x**3*z).tail_degree(x) == 3 + + assert R(0).tail_degree(y) is ninf + assert R(1).tail_degree(y) == 0 + assert (x + 1).tail_degree(y) == 0 + assert (2*y**3 + x**3*z).tail_degree(y) == 0 + assert (x*y**3 + x**3*z).tail_degree(y) == 0 + assert (7*x**5*y**3 + x**3*z).tail_degree(y) == 0 + + assert R(0).tail_degree(z) is ninf + assert R(1).tail_degree(z) == 0 + assert (x + 1).tail_degree(z) == 0 + assert (2*y**3 + x**3*z).tail_degree(z) == 0 + assert (x*y**3 + x**3*z).tail_degree(z) == 0 + assert (7*x**5*y**3 + x**3*z).tail_degree(z) == 0 + + R, = ring("", ZZ) + assert R(0).tail_degree() is ninf + assert R(1).tail_degree() == 0 + +def test_PolyElement_degrees(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R(0).degrees() == (ninf, ninf, ninf) + assert R(1).degrees() == (0, 0, 0) + assert (x**2*y + x**3*z**2).degrees() == (3, 1, 2) + +def test_PolyElement_tail_degrees(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R(0).tail_degrees() == (ninf, ninf, ninf) + assert R(1).tail_degrees() == (0, 0, 0) + assert (x**2*y + x**3*z**2).tail_degrees() == (2, 0, 0) + +def test_PolyElement_coeff(): + R, x, y, z = ring("x,y,z", ZZ, lex) + f = 3*x**2*y - x*y*z + 7*z**3 + 23 + + assert f.coeff(1) == 23 + raises(ValueError, lambda: f.coeff(3)) + + assert f.coeff(x) == 0 + assert f.coeff(y) == 0 + assert f.coeff(z) == 0 + + assert f.coeff(x**2*y) == 3 + assert f.coeff(x*y*z) == -1 + assert f.coeff(z**3) == 7 + + raises(ValueError, lambda: f.coeff(3*x**2*y)) + raises(ValueError, lambda: f.coeff(-x*y*z)) + raises(ValueError, lambda: f.coeff(7*z**3)) + + R, = ring("", ZZ) + assert R(3).coeff(1) == 3 + +def test_PolyElement_LC(): + R, x, y = ring("x,y", QQ, lex) + assert R(0).LC == QQ(0) + assert (QQ(1,2)*x).LC == QQ(1, 2) + assert (QQ(1,4)*x*y + QQ(1,2)*x).LC == QQ(1, 4) + +def test_PolyElement_LM(): + R, x, y = ring("x,y", QQ, lex) + assert R(0).LM == (0, 0) + assert (QQ(1,2)*x).LM == (1, 0) + assert (QQ(1,4)*x*y + QQ(1,2)*x).LM == (1, 1) + +def test_PolyElement_LT(): + R, x, y = ring("x,y", QQ, lex) + assert R(0).LT == ((0, 0), QQ(0)) + assert (QQ(1,2)*x).LT == ((1, 0), QQ(1, 2)) + assert (QQ(1,4)*x*y + QQ(1,2)*x).LT == ((1, 1), QQ(1, 4)) + + R, = ring("", ZZ) + assert R(0).LT == ((), 0) + assert R(1).LT == ((), 1) + +def test_PolyElement_leading_monom(): + R, x, y = ring("x,y", QQ, lex) + assert R(0).leading_monom() == 0 + assert (QQ(1,2)*x).leading_monom() == x + assert (QQ(1,4)*x*y + QQ(1,2)*x).leading_monom() == x*y + +def test_PolyElement_leading_term(): + R, x, y = ring("x,y", QQ, lex) + assert R(0).leading_term() == 0 + assert (QQ(1,2)*x).leading_term() == QQ(1,2)*x + assert (QQ(1,4)*x*y + QQ(1,2)*x).leading_term() == QQ(1,4)*x*y + +def test_PolyElement_terms(): + R, x,y,z = ring("x,y,z", QQ) + terms = (x**2/3 + y**3/4 + z**4/5).terms() + assert terms == [((2,0,0), QQ(1,3)), ((0,3,0), QQ(1,4)), ((0,0,4), QQ(1,5))] + + R, x,y = ring("x,y", ZZ, lex) + f = x*y**7 + 2*x**2*y**3 + + assert f.terms() == f.terms(lex) == f.terms('lex') == [((2, 3), 2), ((1, 7), 1)] + assert f.terms(grlex) == f.terms('grlex') == [((1, 7), 1), ((2, 3), 2)] + + R, x,y = ring("x,y", ZZ, grlex) + f = x*y**7 + 2*x**2*y**3 + + assert f.terms() == f.terms(grlex) == f.terms('grlex') == [((1, 7), 1), ((2, 3), 2)] + assert f.terms(lex) == f.terms('lex') == [((2, 3), 2), ((1, 7), 1)] + + R, = ring("", ZZ) + assert R(3).terms() == [((), 3)] + +def test_PolyElement_monoms(): + R, x,y,z = ring("x,y,z", QQ) + monoms = (x**2/3 + y**3/4 + z**4/5).monoms() + assert monoms == [(2,0,0), (0,3,0), (0,0,4)] + + R, x,y = ring("x,y", ZZ, lex) + f = x*y**7 + 2*x**2*y**3 + + assert f.monoms() == f.monoms(lex) == f.monoms('lex') == [(2, 3), (1, 7)] + assert f.monoms(grlex) == f.monoms('grlex') == [(1, 7), (2, 3)] + + R, x,y = ring("x,y", ZZ, grlex) + f = x*y**7 + 2*x**2*y**3 + + assert f.monoms() == f.monoms(grlex) == f.monoms('grlex') == [(1, 7), (2, 3)] + assert f.monoms(lex) == f.monoms('lex') == [(2, 3), (1, 7)] + +def test_PolyElement_coeffs(): + R, x,y,z = ring("x,y,z", QQ) + coeffs = (x**2/3 + y**3/4 + z**4/5).coeffs() + assert coeffs == [QQ(1,3), QQ(1,4), QQ(1,5)] + + R, x,y = ring("x,y", ZZ, lex) + f = x*y**7 + 2*x**2*y**3 + + assert f.coeffs() == f.coeffs(lex) == f.coeffs('lex') == [2, 1] + assert f.coeffs(grlex) == f.coeffs('grlex') == [1, 2] + + R, x,y = ring("x,y", ZZ, grlex) + f = x*y**7 + 2*x**2*y**3 + + assert f.coeffs() == f.coeffs(grlex) == f.coeffs('grlex') == [1, 2] + assert f.coeffs(lex) == f.coeffs('lex') == [2, 1] + +def test_PolyElement___add__(): + Rt, t = ring("t", ZZ) + Ruv, u,v = ring("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Ruv) + + assert dict(x + 3*y) == {(1, 0, 0): 1, (0, 1, 0): 3} + + assert dict(u + x) == dict(x + u) == {(1, 0, 0): 1, (0, 0, 0): u} + assert dict(u + x*y) == dict(x*y + u) == {(1, 1, 0): 1, (0, 0, 0): u} + assert dict(u + x*y + z) == dict(x*y + z + u) == {(1, 1, 0): 1, (0, 0, 1): 1, (0, 0, 0): u} + + assert dict(u*x + x) == dict(x + u*x) == {(1, 0, 0): u + 1} + assert dict(u*x + x*y) == dict(x*y + u*x) == {(1, 1, 0): 1, (1, 0, 0): u} + assert dict(u*x + x*y + z) == dict(x*y + z + u*x) == {(1, 1, 0): 1, (0, 0, 1): 1, (1, 0, 0): u} + + raises(TypeError, lambda: t + x) + raises(TypeError, lambda: x + t) + raises(TypeError, lambda: t + u) + raises(TypeError, lambda: u + t) + + Fuv, u,v = field("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Fuv) + + assert dict(u + x) == dict(x + u) == {(1, 0, 0): 1, (0, 0, 0): u} + + Rxyz, x,y,z = ring("x,y,z", EX) + + assert dict(EX(pi) + x*y*z) == dict(x*y*z + EX(pi)) == {(1, 1, 1): EX(1), (0, 0, 0): EX(pi)} + +def test_PolyElement___sub__(): + Rt, t = ring("t", ZZ) + Ruv, u,v = ring("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Ruv) + + assert dict(x - 3*y) == {(1, 0, 0): 1, (0, 1, 0): -3} + + assert dict(-u + x) == dict(x - u) == {(1, 0, 0): 1, (0, 0, 0): -u} + assert dict(-u + x*y) == dict(x*y - u) == {(1, 1, 0): 1, (0, 0, 0): -u} + assert dict(-u + x*y + z) == dict(x*y + z - u) == {(1, 1, 0): 1, (0, 0, 1): 1, (0, 0, 0): -u} + + assert dict(-u*x + x) == dict(x - u*x) == {(1, 0, 0): -u + 1} + assert dict(-u*x + x*y) == dict(x*y - u*x) == {(1, 1, 0): 1, (1, 0, 0): -u} + assert dict(-u*x + x*y + z) == dict(x*y + z - u*x) == {(1, 1, 0): 1, (0, 0, 1): 1, (1, 0, 0): -u} + + raises(TypeError, lambda: t - x) + raises(TypeError, lambda: x - t) + raises(TypeError, lambda: t - u) + raises(TypeError, lambda: u - t) + + Fuv, u,v = field("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Fuv) + + assert dict(-u + x) == dict(x - u) == {(1, 0, 0): 1, (0, 0, 0): -u} + + Rxyz, x,y,z = ring("x,y,z", EX) + + assert dict(-EX(pi) + x*y*z) == dict(x*y*z - EX(pi)) == {(1, 1, 1): EX(1), (0, 0, 0): -EX(pi)} + +def test_PolyElement___mul__(): + Rt, t = ring("t", ZZ) + Ruv, u,v = ring("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Ruv) + + assert dict(u*x) == dict(x*u) == {(1, 0, 0): u} + + assert dict(2*u*x + z) == dict(x*2*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1} + assert dict(u*2*x + z) == dict(2*x*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1} + assert dict(2*u*x + z) == dict(x*2*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1} + assert dict(u*x*2 + z) == dict(x*u*2 + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1} + + assert dict(2*u*x*y + z) == dict(x*y*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(u*2*x*y + z) == dict(2*x*y*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(2*u*x*y + z) == dict(x*y*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(u*x*y*2 + z) == dict(x*y*u*2 + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + + assert dict(2*u*y*x + z) == dict(y*x*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(u*2*y*x + z) == dict(2*y*x*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(2*u*y*x + z) == dict(y*x*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + assert dict(u*y*x*2 + z) == dict(y*x*u*2 + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1} + + assert dict(3*u*(x + y) + z) == dict((x + y)*3*u + z) == {(1, 0, 0): 3*u, (0, 1, 0): 3*u, (0, 0, 1): 1} + + raises(TypeError, lambda: t*x + z) + raises(TypeError, lambda: x*t + z) + raises(TypeError, lambda: t*u + z) + raises(TypeError, lambda: u*t + z) + + Fuv, u,v = field("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Fuv) + + assert dict(u*x) == dict(x*u) == {(1, 0, 0): u} + + Rxyz, x,y,z = ring("x,y,z", EX) + + assert dict(EX(pi)*x*y*z) == dict(x*y*z*EX(pi)) == {(1, 1, 1): EX(pi)} + +def test_PolyElement___truediv__(): + R, x,y,z = ring("x,y,z", ZZ) + + assert (2*x**2 - 4)/2 == x**2 - 2 + assert (2*x**2 - 3)/2 == x**2 + + assert (x**2 - 1).quo(x) == x + assert (x**2 - x).quo(x) == x - 1 + + raises(ExactQuotientFailed, lambda: (x**2 - 1)/x) + assert (x**2 - x)/x == x - 1 + raises(ExactQuotientFailed, lambda: (x**2 - 1)/(2*x)) + + assert (x**2 - 1).quo(2*x) == 0 + assert (x**2 - x)/(x - 1) == (x**2 - x).quo(x - 1) == x + + + R, x,y,z = ring("x,y,z", ZZ) + assert len((x**2/3 + y**3/4 + z**4/5).terms()) == 0 + + R, x,y,z = ring("x,y,z", QQ) + assert len((x**2/3 + y**3/4 + z**4/5).terms()) == 3 + + Rt, t = ring("t", ZZ) + Ruv, u,v = ring("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Ruv) + + assert dict((u**2*x + u)/u) == {(1, 0, 0): u, (0, 0, 0): 1} + raises(ExactQuotientFailed, lambda: u/(u**2*x + u)) + + raises(TypeError, lambda: t/x) + raises(TypeError, lambda: x/t) + raises(TypeError, lambda: t/u) + raises(TypeError, lambda: u/t) + + R, x = ring("x", ZZ) + f, g = x**2 + 2*x + 3, R(0) + + raises(ZeroDivisionError, lambda: f.div(g)) + raises(ZeroDivisionError, lambda: divmod(f, g)) + raises(ZeroDivisionError, lambda: f.rem(g)) + raises(ZeroDivisionError, lambda: f % g) + raises(ZeroDivisionError, lambda: f.quo(g)) + raises(ZeroDivisionError, lambda: f / g) + raises(ZeroDivisionError, lambda: f.exquo(g)) + + R, x, y = ring("x,y", ZZ) + f, g = x*y + 2*x + 3, R(0) + + raises(ZeroDivisionError, lambda: f.div(g)) + raises(ZeroDivisionError, lambda: divmod(f, g)) + raises(ZeroDivisionError, lambda: f.rem(g)) + raises(ZeroDivisionError, lambda: f % g) + raises(ZeroDivisionError, lambda: f.quo(g)) + raises(ZeroDivisionError, lambda: f / g) + raises(ZeroDivisionError, lambda: f.exquo(g)) + + R, x = ring("x", ZZ) + + f, g = x**2 + 1, 2*x - 4 + q, r = R(0), x**2 + 1 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = 3*x**3 + x**2 + x + 5, 5*x**2 - 3*x + 1 + q, r = R(0), f + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = 5*x**4 + 4*x**3 + 3*x**2 + 2*x + 1, x**2 + 2*x + 3 + q, r = 5*x**2 - 6*x, 20*x + 1 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = 5*x**5 + 4*x**4 + 3*x**3 + 2*x**2 + x, x**4 + 2*x**3 + 9 + q, r = 5*x - 6, 15*x**3 + 2*x**2 - 44*x + 54 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + R, x = ring("x", QQ) + + f, g = x**2 + 1, 2*x - 4 + q, r = x/2 + 1, R(5) + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = 3*x**3 + x**2 + x + 5, 5*x**2 - 3*x + 1 + q, r = QQ(3, 5)*x + QQ(14, 25), QQ(52, 25)*x + QQ(111, 25) + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + R, x,y = ring("x,y", ZZ) + + f, g = x**2 - y**2, x - y + q, r = x + y, R(0) + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + assert f.exquo(g) == f / g == q + + f, g = x**2 + y**2, x - y + q, r = x + y, 2*y**2 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = x**2 + y**2, -x + y + q, r = -x - y, 2*y**2 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = x**2 + y**2, 2*x - 2*y + q, r = R(0), f + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + R, x,y = ring("x,y", QQ) + + f, g = x**2 - y**2, x - y + q, r = x + y, R(0) + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + assert f.exquo(g) == f / g == q + + f, g = x**2 + y**2, x - y + q, r = x + y, 2*y**2 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = x**2 + y**2, -x + y + q, r = -x - y, 2*y**2 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + + f, g = x**2 + y**2, 2*x - 2*y + q, r = x/2 + y/2, 2*y**2 + + assert f.div(g) == divmod(f, g) == (q, r) + assert f.rem(g) == f % g == r + assert f.quo(g) == q + raises(ExactQuotientFailed, lambda: f / g) + raises(ExactQuotientFailed, lambda: f.exquo(g)) + +def test_PolyElement___pow__(): + R, x = ring("x", ZZ, grlex) + f = 2*x + 3 + + assert f**0 == 1 + assert f**1 == f + raises(ValueError, lambda: f**(-1)) + + assert f**2 == f._pow_generic(2) == f._pow_multinomial(2) == 4*x**2 + 12*x + 9 + assert f**3 == f._pow_generic(3) == f._pow_multinomial(3) == 8*x**3 + 36*x**2 + 54*x + 27 + assert f**4 == f._pow_generic(4) == f._pow_multinomial(4) == 16*x**4 + 96*x**3 + 216*x**2 + 216*x + 81 + assert f**5 == f._pow_generic(5) == f._pow_multinomial(5) == 32*x**5 + 240*x**4 + 720*x**3 + 1080*x**2 + 810*x + 243 + + R, x,y,z = ring("x,y,z", ZZ, grlex) + f = x**3*y - 2*x*y**2 - 3*z + 1 + g = x**6*y**2 - 4*x**4*y**3 - 6*x**3*y*z + 2*x**3*y + 4*x**2*y**4 + 12*x*y**2*z - 4*x*y**2 + 9*z**2 - 6*z + 1 + + assert f**2 == f._pow_generic(2) == f._pow_multinomial(2) == g + + R, t = ring("t", ZZ) + f = -11200*t**4 - 2604*t**2 + 49 + g = 15735193600000000*t**16 + 14633730048000000*t**14 + 4828147466240000*t**12 \ + + 598976863027200*t**10 + 3130812416256*t**8 - 2620523775744*t**6 \ + + 92413760096*t**4 - 1225431984*t**2 + 5764801 + + assert f**4 == f._pow_generic(4) == f._pow_multinomial(4) == g + +def test_PolyElement_div(): + R, x = ring("x", ZZ, grlex) + + f = x**3 - 12*x**2 - 42 + g = x - 3 + + q = x**2 - 9*x - 27 + r = -123 + + assert f.div([g]) == ([q], r) + + R, x = ring("x", ZZ, grlex) + f = x**2 + 2*x + 2 + assert f.div([R(1)]) == ([f], 0) + + R, x = ring("x", QQ, grlex) + f = x**2 + 2*x + 2 + assert f.div([R(2)]) == ([QQ(1,2)*x**2 + x + 1], 0) + + R, x,y = ring("x,y", ZZ, grlex) + f = 4*x**2*y - 2*x*y + 4*x - 2*y + 8 + + assert f.div([R(2)]) == ([2*x**2*y - x*y + 2*x - y + 4], 0) + assert f.div([2*y]) == ([2*x**2 - x - 1], 4*x + 8) + + f = x - 1 + g = y - 1 + + assert f.div([g]) == ([0], f) + + f = x*y**2 + 1 + G = [x*y + 1, y + 1] + + Q = [y, -1] + r = 2 + + assert f.div(G) == (Q, r) + + f = x**2*y + x*y**2 + y**2 + G = [x*y - 1, y**2 - 1] + + Q = [x + y, 1] + r = x + y + 1 + + assert f.div(G) == (Q, r) + + G = [y**2 - 1, x*y - 1] + + Q = [x + 1, x] + r = 2*x + 1 + + assert f.div(G) == (Q, r) + + R, = ring("", ZZ) + assert R(3).div(R(2)) == (0, 3) + + R, = ring("", QQ) + assert R(3).div(R(2)) == (QQ(3, 2), 0) + +def test_PolyElement_rem(): + R, x = ring("x", ZZ, grlex) + + f = x**3 - 12*x**2 - 42 + g = x - 3 + r = -123 + + assert f.rem([g]) == f.div([g])[1] == r + + R, x,y = ring("x,y", ZZ, grlex) + + f = 4*x**2*y - 2*x*y + 4*x - 2*y + 8 + + assert f.rem([R(2)]) == f.div([R(2)])[1] == 0 + assert f.rem([2*y]) == f.div([2*y])[1] == 4*x + 8 + + f = x - 1 + g = y - 1 + + assert f.rem([g]) == f.div([g])[1] == f + + f = x*y**2 + 1 + G = [x*y + 1, y + 1] + r = 2 + + assert f.rem(G) == f.div(G)[1] == r + + f = x**2*y + x*y**2 + y**2 + G = [x*y - 1, y**2 - 1] + r = x + y + 1 + + assert f.rem(G) == f.div(G)[1] == r + + G = [y**2 - 1, x*y - 1] + r = 2*x + 1 + + assert f.rem(G) == f.div(G)[1] == r + +def test_PolyElement_deflate(): + R, x = ring("x", ZZ) + + assert (2*x**2).deflate(x**4 + 4*x**2 + 1) == ((2,), [2*x, x**2 + 4*x + 1]) + + R, x,y = ring("x,y", ZZ) + + assert R(0).deflate(R(0)) == ((1, 1), [0, 0]) + assert R(1).deflate(R(0)) == ((1, 1), [1, 0]) + assert R(1).deflate(R(2)) == ((1, 1), [1, 2]) + assert R(1).deflate(2*y) == ((1, 1), [1, 2*y]) + assert (2*y).deflate(2*y) == ((1, 1), [2*y, 2*y]) + assert R(2).deflate(2*y**2) == ((1, 2), [2, 2*y]) + assert (2*y**2).deflate(2*y**2) == ((1, 2), [2*y, 2*y]) + + f = x**4*y**2 + x**2*y + 1 + g = x**2*y**3 + x**2*y + 1 + + assert f.deflate(g) == ((2, 1), [x**2*y**2 + x*y + 1, x*y**3 + x*y + 1]) + +def test_PolyElement_clear_denoms(): + R, x,y = ring("x,y", QQ) + + assert R(1).clear_denoms() == (ZZ(1), 1) + assert R(7).clear_denoms() == (ZZ(1), 7) + + assert R(QQ(7,3)).clear_denoms() == (3, 7) + assert R(QQ(7,3)).clear_denoms() == (3, 7) + + assert (3*x**2 + x).clear_denoms() == (1, 3*x**2 + x) + assert (x**2 + QQ(1,2)*x).clear_denoms() == (2, 2*x**2 + x) + + rQQ, x,t = ring("x,t", QQ, lex) + rZZ, X,T = ring("x,t", ZZ, lex) + + F = [x - QQ(17824537287975195925064602467992950991718052713078834557692023531499318507213727406844943097,413954288007559433755329699713866804710749652268151059918115348815925474842910720000)*t**7 + - QQ(4882321164854282623427463828745855894130208215961904469205260756604820743234704900167747753,12936071500236232304854053116058337647210926633379720622441104650497671088840960000)*t**6 + - QQ(36398103304520066098365558157422127347455927422509913596393052633155821154626830576085097433,25872143000472464609708106232116675294421853266759441244882209300995342177681920000)*t**5 + - QQ(168108082231614049052707339295479262031324376786405372698857619250210703675982492356828810819,58212321751063045371843239022262519412449169850208742800984970927239519899784320000)*t**4 + - QQ(5694176899498574510667890423110567593477487855183144378347226247962949388653159751849449037,1617008937529529038106756639507292205901365829172465077805138081312208886105120000)*t**3 + - QQ(154482622347268833757819824809033388503591365487934245386958884099214649755244381307907779,60637835157357338929003373981523457721301218593967440417692678049207833228942000)*t**2 + - QQ(2452813096069528207645703151222478123259511586701148682951852876484544822947007791153163,2425513406294293557160134959260938308852048743758697616707707121968313329157680)*t + - QQ(34305265428126440542854669008203683099323146152358231964773310260498715579162112959703,202126117191191129763344579938411525737670728646558134725642260164026110763140), + t**8 + QQ(693749860237914515552,67859264524169150569)*t**7 + + QQ(27761407182086143225024,610733380717522355121)*t**6 + + QQ(7785127652157884044288,67859264524169150569)*t**5 + + QQ(36567075214771261409792,203577793572507451707)*t**4 + + QQ(36336335165196147384320,203577793572507451707)*t**3 + + QQ(7452455676042754048000,67859264524169150569)*t**2 + + QQ(2593331082514399232000,67859264524169150569)*t + + QQ(390399197427343360000,67859264524169150569)] + + G = [3725588592068034903797967297424801242396746870413359539263038139343329273586196480000*X - + 160420835591776763325581422211936558925462474417709511019228211783493866564923546661604487873*T**7 - + 1406108495478033395547109582678806497509499966197028487131115097902188374051595011248311352864*T**6 - + 5241326875850889518164640374668786338033653548841427557880599579174438246266263602956254030352*T**5 - + 10758917262823299139373269714910672770004760114329943852726887632013485035262879510837043892416*T**4 - + 13119383576444715672578819534846747735372132018341964647712009275306635391456880068261130581248*T**3 - + 9491412317016197146080450036267011389660653495578680036574753839055748080962214787557853941760*T**2 - + 3767520915562795326943800040277726397326609797172964377014046018280260848046603967211258368000*T - + 632314652371226552085897259159210286886724229880266931574701654721512325555116066073245696000, + 610733380717522355121*T**8 + + 6243748742141230639968*T**7 + + 27761407182086143225024*T**6 + + 70066148869420956398592*T**5 + + 109701225644313784229376*T**4 + + 109009005495588442152960*T**3 + + 67072101084384786432000*T**2 + + 23339979742629593088000*T + + 3513592776846090240000] + + assert [ f.clear_denoms()[1].set_ring(rZZ) for f in F ] == G + +def test_PolyElement_cofactors(): + R, x, y = ring("x,y", ZZ) + + f, g = R(0), R(0) + assert f.cofactors(g) == (0, 0, 0) + + f, g = R(2), R(0) + assert f.cofactors(g) == (2, 1, 0) + + f, g = R(-2), R(0) + assert f.cofactors(g) == (2, -1, 0) + + f, g = R(0), R(-2) + assert f.cofactors(g) == (2, 0, -1) + + f, g = R(0), 2*x + 4 + assert f.cofactors(g) == (2*x + 4, 0, 1) + + f, g = 2*x + 4, R(0) + assert f.cofactors(g) == (2*x + 4, 1, 0) + + f, g = R(2), R(2) + assert f.cofactors(g) == (2, 1, 1) + + f, g = R(-2), R(2) + assert f.cofactors(g) == (2, -1, 1) + + f, g = R(2), R(-2) + assert f.cofactors(g) == (2, 1, -1) + + f, g = R(-2), R(-2) + assert f.cofactors(g) == (2, -1, -1) + + f, g = x**2 + 2*x + 1, R(1) + assert f.cofactors(g) == (1, x**2 + 2*x + 1, 1) + + f, g = x**2 + 2*x + 1, R(2) + assert f.cofactors(g) == (1, x**2 + 2*x + 1, 2) + + f, g = 2*x**2 + 4*x + 2, R(2) + assert f.cofactors(g) == (2, x**2 + 2*x + 1, 1) + + f, g = R(2), 2*x**2 + 4*x + 2 + assert f.cofactors(g) == (2, 1, x**2 + 2*x + 1) + + f, g = 2*x**2 + 4*x + 2, x + 1 + assert f.cofactors(g) == (x + 1, 2*x + 2, 1) + + f, g = x + 1, 2*x**2 + 4*x + 2 + assert f.cofactors(g) == (x + 1, 1, 2*x + 2) + + R, x, y, z, t = ring("x,y,z,t", ZZ) + + f, g = t**2 + 2*t + 1, 2*t + 2 + assert f.cofactors(g) == (t + 1, t + 1, 2) + + f, g = z**2*t**2 + 2*z**2*t + z**2 + z*t + z, t**2 + 2*t + 1 + h, cff, cfg = t + 1, z**2*t + z**2 + z, t + 1 + + assert f.cofactors(g) == (h, cff, cfg) + assert g.cofactors(f) == (h, cfg, cff) + + R, x, y = ring("x,y", QQ) + + f = QQ(1,2)*x**2 + x + QQ(1,2) + g = QQ(1,2)*x + QQ(1,2) + + h = x + 1 + + assert f.cofactors(g) == (h, g, QQ(1,2)) + assert g.cofactors(f) == (h, QQ(1,2), g) + + R, x, y = ring("x,y", RR) + + f = 2.1*x*y**2 - 2.1*x*y + 2.1*x + g = 2.1*x**3 + h = 1.0*x + + assert f.cofactors(g) == (h, f/h, g/h) + assert g.cofactors(f) == (h, g/h, f/h) + +def test_PolyElement_gcd(): + R, x, y = ring("x,y", QQ) + + f = QQ(1,2)*x**2 + x + QQ(1,2) + g = QQ(1,2)*x + QQ(1,2) + + assert f.gcd(g) == x + 1 + +def test_PolyElement_cancel(): + R, x, y = ring("x,y", ZZ) + + f = 2*x**3 + 4*x**2 + 2*x + g = 3*x**2 + 3*x + F = 2*x + 2 + G = 3 + + assert f.cancel(g) == (F, G) + + assert (-f).cancel(g) == (-F, G) + assert f.cancel(-g) == (-F, G) + + R, x, y = ring("x,y", QQ) + + f = QQ(1,2)*x**3 + x**2 + QQ(1,2)*x + g = QQ(1,3)*x**2 + QQ(1,3)*x + F = 3*x + 3 + G = 2 + + assert f.cancel(g) == (F, G) + + assert (-f).cancel(g) == (-F, G) + assert f.cancel(-g) == (-F, G) + + Fx, x = field("x", ZZ) + Rt, t = ring("t", Fx) + + f = (-x**2 - 4)/4*t + g = t**2 + (x**2 + 2)/2 + + assert f.cancel(g) == ((-x**2 - 4)*t, 4*t**2 + 2*x**2 + 4) + +def test_PolyElement_max_norm(): + R, x, y = ring("x,y", ZZ) + + assert R(0).max_norm() == 0 + assert R(1).max_norm() == 1 + + assert (x**3 + 4*x**2 + 2*x + 3).max_norm() == 4 + +def test_PolyElement_l1_norm(): + R, x, y = ring("x,y", ZZ) + + assert R(0).l1_norm() == 0 + assert R(1).l1_norm() == 1 + + assert (x**3 + 4*x**2 + 2*x + 3).l1_norm() == 10 + +def test_PolyElement_diff(): + R, X = xring("x:11", QQ) + + f = QQ(288,5)*X[0]**8*X[1]**6*X[4]**3*X[10]**2 + 8*X[0]**2*X[2]**3*X[4]**3 +2*X[0]**2 - 2*X[1]**2 + + assert f.diff(X[0]) == QQ(2304,5)*X[0]**7*X[1]**6*X[4]**3*X[10]**2 + 16*X[0]*X[2]**3*X[4]**3 + 4*X[0] + assert f.diff(X[4]) == QQ(864,5)*X[0]**8*X[1]**6*X[4]**2*X[10]**2 + 24*X[0]**2*X[2]**3*X[4]**2 + assert f.diff(X[10]) == QQ(576,5)*X[0]**8*X[1]**6*X[4]**3*X[10] + +def test_PolyElement___call__(): + R, x = ring("x", ZZ) + f = 3*x + 1 + + assert f(0) == 1 + assert f(1) == 4 + + raises(ValueError, lambda: f()) + raises(ValueError, lambda: f(0, 1)) + + raises(CoercionFailed, lambda: f(QQ(1,7))) + + R, x,y = ring("x,y", ZZ) + f = 3*x + y**2 + 1 + + assert f(0, 0) == 1 + assert f(1, 7) == 53 + + Ry = R.drop(x) + + assert f(0) == Ry.y**2 + 1 + assert f(1) == Ry.y**2 + 4 + + raises(ValueError, lambda: f()) + raises(ValueError, lambda: f(0, 1, 2)) + + raises(CoercionFailed, lambda: f(1, QQ(1,7))) + raises(CoercionFailed, lambda: f(QQ(1,7), 1)) + raises(CoercionFailed, lambda: f(QQ(1,7), QQ(1,7))) + +def test_PolyElement_evaluate(): + R, x = ring("x", ZZ) + f = x**3 + 4*x**2 + 2*x + 3 + + r = f.evaluate(x, 0) + assert r == 3 and not isinstance(r, PolyElement) + + raises(CoercionFailed, lambda: f.evaluate(x, QQ(1,7))) + + R, x, y, z = ring("x,y,z", ZZ) + f = (x*y)**3 + 4*(x*y)**2 + 2*x*y + 3 + + r = f.evaluate(x, 0) + assert r == 3 and R.drop(x).is_element(r) + r = f.evaluate([(x, 0), (y, 0)]) + assert r == 3 and R.drop(x, y).is_element(r) + r = f.evaluate(y, 0) + assert r == 3 and R.drop(y).is_element(r) + r = f.evaluate([(y, 0), (x, 0)]) + assert r == 3 and R.drop(y, x).is_element(r) + + r = f.evaluate([(x, 0), (y, 0), (z, 0)]) + assert r == 3 and not isinstance(r, PolyElement) + + raises(CoercionFailed, lambda: f.evaluate([(x, 1), (y, QQ(1,7))])) + raises(CoercionFailed, lambda: f.evaluate([(x, QQ(1,7)), (y, 1)])) + raises(CoercionFailed, lambda: f.evaluate([(x, QQ(1,7)), (y, QQ(1,7))])) + +def test_PolyElement_subs(): + R, x = ring("x", ZZ) + f = x**3 + 4*x**2 + 2*x + 3 + + r = f.subs(x, 0) + assert r == 3 and R.is_element(r) + + raises(CoercionFailed, lambda: f.subs(x, QQ(1,7))) + + R, x, y, z = ring("x,y,z", ZZ) + f = x**3 + 4*x**2 + 2*x + 3 + + r = f.subs(x, 0) + assert r == 3 and R.is_element(r) + r = f.subs([(x, 0), (y, 0)]) + assert r == 3 and R.is_element(r) + + raises(CoercionFailed, lambda: f.subs([(x, 1), (y, QQ(1,7))])) + raises(CoercionFailed, lambda: f.subs([(x, QQ(1,7)), (y, 1)])) + raises(CoercionFailed, lambda: f.subs([(x, QQ(1,7)), (y, QQ(1,7))])) + +def test_PolyElement_symmetrize(): + R, x, y = ring("x,y", ZZ) + + # Homogeneous, symmetric + f = x**2 + y**2 + sym, rem, m = f.symmetrize() + assert rem == 0 + assert sym.compose(m) + rem == f + + # Homogeneous, asymmetric + f = x**2 - y**2 + sym, rem, m = f.symmetrize() + assert rem != 0 + assert sym.compose(m) + rem == f + + # Inhomogeneous, symmetric + f = x*y + 7 + sym, rem, m = f.symmetrize() + assert rem == 0 + assert sym.compose(m) + rem == f + + # Inhomogeneous, asymmetric + f = y + 7 + sym, rem, m = f.symmetrize() + assert rem != 0 + assert sym.compose(m) + rem == f + + # Constant + f = R.from_expr(3) + sym, rem, m = f.symmetrize() + assert rem == 0 + assert sym.compose(m) + rem == f + + # Constant constructed from sring + R, f = sring(3) + sym, rem, m = f.symmetrize() + assert rem == 0 + assert sym.compose(m) + rem == f + +def test_PolyElement_compose(): + R, x = ring("x", ZZ) + f = x**3 + 4*x**2 + 2*x + 3 + + r = f.compose(x, 0) + assert r == 3 and R.is_element(r) + + assert f.compose(x, x) == f + assert f.compose(x, x**2) == x**6 + 4*x**4 + 2*x**2 + 3 + + raises(CoercionFailed, lambda: f.compose(x, QQ(1,7))) + + R, x, y, z = ring("x,y,z", ZZ) + f = x**3 + 4*x**2 + 2*x + 3 + + r = f.compose(x, 0) + assert r == 3 and R.is_element(r) + r = f.compose([(x, 0), (y, 0)]) + assert r == 3 and R.is_element(r) + + r = (x**3 + 4*x**2 + 2*x*y*z + 3).compose(x, y*z**2 - 1) + q = (y*z**2 - 1)**3 + 4*(y*z**2 - 1)**2 + 2*(y*z**2 - 1)*y*z + 3 + assert r == q and R.is_element(r) + +def test_PolyElement_is_(): + R, x,y,z = ring("x,y,z", QQ) + + assert (x - x).is_generator == False + assert (x - x).is_ground == True + assert (x - x).is_monomial == True + assert (x - x).is_term == True + + assert (x - x + 1).is_generator == False + assert (x - x + 1).is_ground == True + assert (x - x + 1).is_monomial == True + assert (x - x + 1).is_term == True + + assert x.is_generator == True + assert x.is_ground == False + assert x.is_monomial == True + assert x.is_term == True + + assert (x*y).is_generator == False + assert (x*y).is_ground == False + assert (x*y).is_monomial == True + assert (x*y).is_term == True + + assert (3*x).is_generator == False + assert (3*x).is_ground == False + assert (3*x).is_monomial == False + assert (3*x).is_term == True + + assert (3*x + 1).is_generator == False + assert (3*x + 1).is_ground == False + assert (3*x + 1).is_monomial == False + assert (3*x + 1).is_term == False + + assert R(0).is_zero is True + assert R(1).is_zero is False + + assert R(0).is_one is False + assert R(1).is_one is True + + assert (x - 1).is_monic is True + assert (2*x - 1).is_monic is False + + assert (3*x + 2).is_primitive is True + assert (4*x + 2).is_primitive is False + + assert (x + y + z + 1).is_linear is True + assert (x*y*z + 1).is_linear is False + + assert (x*y + z + 1).is_quadratic is True + assert (x*y*z + 1).is_quadratic is False + + assert (x - 1).is_squarefree is True + assert ((x - 1)**2).is_squarefree is False + + assert (x**2 + x + 1).is_irreducible is True + assert (x**2 + 2*x + 1).is_irreducible is False + + _, t = ring("t", FF(11)) + + assert (7*t + 3).is_irreducible is True + assert (7*t**2 + 3*t + 1).is_irreducible is False + + _, u = ring("u", ZZ) + f = u**16 + u**14 - u**10 - u**8 - u**6 + u**2 + + assert f.is_cyclotomic is False + assert (f + 1).is_cyclotomic is True + + raises(MultivariatePolynomialError, lambda: x.is_cyclotomic) + + R, = ring("", ZZ) + assert R(4).is_squarefree is True + assert R(6).is_irreducible is True + +def test_PolyElement_drop(): + R, x,y,z = ring("x,y,z", ZZ) + + assert R(1).drop(0).ring == PolyRing("y,z", ZZ, lex) + assert R(1).drop(0).drop(0).ring == PolyRing("z", ZZ, lex) + assert R.is_element(R(1).drop(0).drop(0).drop(0)) is False + + raises(ValueError, lambda: z.drop(0).drop(0).drop(0)) + raises(ValueError, lambda: x.drop(0)) + +def test_PolyElement_coeff_wrt(): + R, x, y, z = ring("x, y, z", ZZ) + + p = 4*x**3 + 5*y**2 + 6*y**2*z + 7 + assert p.coeff_wrt(1, 2) == 6*z + 5 # using generator index + assert p.coeff_wrt(x, 3) == 4 # using generator + + p = 2*x**4 + 3*x*y**2*z + 10*y**2 + 10*x*z**2 + assert p.coeff_wrt(x, 1) == 3*y**2*z + 10*z**2 + assert p.coeff_wrt(y, 2) == 3*x*z + 10 + + p = 4*x**2 + 2*x*y + 5 + assert p.coeff_wrt(z, 1) == R(0) + assert p.coeff_wrt(y, 2) == R(0) + +def test_PolyElement_prem(): + R, x, y = ring("x, y", ZZ) + + f, g = x**2 + x*y, 2*x + 2 + assert f.prem(g) == -4*y + 4 # first generator is chosen by default if it is not given + + f, g = x**2 + 1, 2*x - 4 + assert f.prem(g) == f.prem(g, x) == 20 + assert f.prem(g, 1) == R(0) + + f, g = x*y + 2*x + 1, x + y + assert f.prem(g) == -y**2 - 2*y + 1 + assert f.prem(g, 1) == f.prem(g, y) == -x**2 + 2*x + 1 + + raises(ZeroDivisionError, lambda: f.prem(R(0))) + +def test_PolyElement_pdiv(): + R, x, y = ring("x,y", ZZ) + + f, g = x**4 + 5*x**3 + 7*x**2, 2*x**2 + 3 + assert f.pdiv(g) == f.pdiv(g, x) == (4*x**2 + 20*x + 22, -60*x - 66) + + f, g = x**2 - y**2, x - y + assert f.pdiv(g) == f.pdiv(g, 0) == (x + y, 0) + + f, g = x*y + 2*x + 1, x + y + assert f.pdiv(g) == (y + 2, -y**2 - 2*y + 1) + assert f.pdiv(g, y) == f.pdiv(g, 1) == (x + 1, -x**2 + 2*x + 1) + + assert R(0).pdiv(g) == (0, 0) + raises(ZeroDivisionError, lambda: f.prem(R(0))) + +def test_PolyElement_pquo(): + R, x, y = ring("x, y", ZZ) + + f, g = x**4 - 4*x**2*y + 4*y**2, x**2 - 2*y + assert f.pquo(g) == f.pquo(g, x) == x**2 - 2*y + assert f.pquo(g, y) == 4*x**2 - 8*y + 4 + + f, g = x**4 - y**4, x**2 - y**2 + assert f.pquo(g) == f.pquo(g, 0) == x**2 + y**2 + +def test_PolyElement_pexquo(): + R, x, y = ring("x, y", ZZ) + + f, g = x**2 - y**2, x - y + assert f.pexquo(g) == f.pexquo(g, x) == x + y + assert f.pexquo(g, y) == f.pexquo(g, 1) == x + y + 1 + + f, g = x**2 + 3*x + 6, x + 2 + raises(ExactQuotientFailed, lambda: f.pexquo(g)) + +def test_PolyElement_gcdex(): + _, x = ring("x", QQ) + + f, g = 2*x, x**2 - 16 + s, t, h = x/32, -QQ(1, 16), 1 + + assert f.half_gcdex(g) == (s, h) + assert f.gcdex(g) == (s, t, h) + +def test_PolyElement_subresultants(): + R, x, y = ring("x, y", ZZ) + + f, g = x**2*y + x*y, x + y # degree(f, x) > degree(g, x) + h = y**3 - y**2 + assert f.subresultants(g) == [f, g, h] # first generator is chosen default + + # generator index or generator is given + assert f.subresultants(g, 0) == f.subresultants(g, x) == [f, g, h] + + assert f.subresultants(g, y) == [x**2*y + x*y, x + y, x**3 + x**2] + + f, g = 2*x - y, x**2 + 2*y + x # degree(f, x) < degree(g, x) + assert f.subresultants(g) == [x**2 + x + 2*y, 2*x - y, y**2 + 10*y] + + f, g = R(0), y**3 - y**2 # f = 0 + assert f.subresultants(g) == [y**3 - y**2, 1] + + f, g = x**2*y + x*y, R(0) # g = 0 + assert f.subresultants(g) == [x**2*y + x*y, 1] + + f, g = R(0), R(0) # f = 0 and g = 0 + assert f.subresultants(g) == [0, 0] + + f, g = x**2 + x, x**2 + x # f and g are same polynomial + assert f.subresultants(g) == [x**2 + x, x**2 + x] + +def test_PolyElement_resultant(): + _, x = ring("x", ZZ) + f, g, h = x**2 - 2*x + 1, x**2 - 1, 0 + + assert f.resultant(g) == h + +def test_PolyElement_discriminant(): + _, x = ring("x", ZZ) + f, g = x**3 + 3*x**2 + 9*x - 13, -11664 + + assert f.discriminant() == g + + F, a, b, c = ring("a,b,c", ZZ) + _, x = ring("x", F) + + f, g = a*x**2 + b*x + c, b**2 - 4*a*c + + assert f.discriminant() == g + +def test_PolyElement_decompose(): + _, x = ring("x", ZZ) + + f = x**12 + 20*x**10 + 150*x**8 + 500*x**6 + 625*x**4 - 2*x**3 - 10*x + 9 + g = x**4 - 2*x + 9 + h = x**3 + 5*x + + assert g.compose(x, h) == f + assert f.decompose() == [g, h] + +def test_PolyElement_shift(): + _, x = ring("x", ZZ) + assert (x**2 - 2*x + 1).shift(2) == x**2 + 2*x + 1 + assert (x**2 - 2*x + 1).shift_list([2]) == x**2 + 2*x + 1 + + R, x, y = ring("x, y", ZZ) + assert (x*y).shift_list([1, 2]) == (x+1)*(y+2) + + raises(MultivariatePolynomialError, lambda: (x*y).shift(1)) + +def test_PolyElement_sturm(): + F, t = field("t", ZZ) + _, x = ring("x", F) + + f = 1024/(15625*t**8)*x**5 - 4096/(625*t**8)*x**4 + 32/(15625*t**4)*x**3 - 128/(625*t**4)*x**2 + F(1)/62500*x - F(1)/625 + + assert f.sturm() == [ + x**3 - 100*x**2 + t**4/64*x - 25*t**4/16, + 3*x**2 - 200*x + t**4/64, + (-t**4/96 + F(20000)/9)*x + 25*t**4/18, + (-9*t**12 - 11520000*t**8 - 3686400000000*t**4)/(576*t**8 - 245760000*t**4 + 26214400000000), + ] + +def test_PolyElement_gff_list(): + _, x = ring("x", ZZ) + + f = x**5 + 2*x**4 - x**3 - 2*x**2 + assert f.gff_list() == [(x, 1), (x + 2, 4)] + + f = x*(x - 1)**3*(x - 2)**2*(x - 4)**2*(x - 5) + assert f.gff_list() == [(x**2 - 5*x + 4, 1), (x**2 - 5*x + 4, 2), (x, 3)] + +def test_PolyElement_norm(): + k = QQ + K = QQ.algebraic_field(sqrt(2)) + sqrt2 = K.unit + _, X, Y = ring("x,y", k) + _, x, y = ring("x,y", K) + + assert (x*y + sqrt2).norm() == X**2*Y**2 - 2 + +def test_PolyElement_sqf_norm(): + R, x = ring("x", QQ.algebraic_field(sqrt(3))) + X = R.to_ground().x + + assert (x**2 - 2).sqf_norm() == ([1], x**2 - 2*sqrt(3)*x + 1, X**4 - 10*X**2 + 1) + + R, x = ring("x", QQ.algebraic_field(sqrt(2))) + X = R.to_ground().x + + assert (x**2 - 3).sqf_norm() == ([1], x**2 - 2*sqrt(2)*x - 1, X**4 - 10*X**2 + 1) + +def test_PolyElement_sqf_list(): + _, x = ring("x", ZZ) + + f = x**5 - x**3 - x**2 + 1 + g = x**3 + 2*x**2 + 2*x + 1 + h = x - 1 + p = x**4 + x**3 - x - 1 + + assert f.sqf_part() == p + assert f.sqf_list() == (1, [(g, 1), (h, 2)]) + +def test_issue_18894(): + items = [S(3)/16 + sqrt(3*sqrt(3) + 10)/8, S(1)/8 + 3*sqrt(3)/16, S(1)/8 + 3*sqrt(3)/16, -S(3)/16 + sqrt(3*sqrt(3) + 10)/8] + R, a = sring(items, extension=True) + assert R.domain == QQ.algebraic_field(sqrt(3)+sqrt(3*sqrt(3)+10)) + assert R.gens == () + result = [] + for item in items: + result.append(R.domain.from_sympy(item)) + assert a == result + +def test_PolyElement_factor_list(): + _, x = ring("x", ZZ) + + f = x**5 - x**3 - x**2 + 1 + + u = x + 1 + v = x - 1 + w = x**2 + x + 1 + + assert f.factor_list() == (1, [(u, 1), (v, 2), (w, 1)]) + + +def test_issue_21410(): + R, x = ring('x', FF(2)) + p = x**6 + x**5 + x**4 + x**3 + 1 + assert p._pow_multinomial(4) == x**24 + x**20 + x**16 + x**12 + 1 + + +def test_zero_polynomial_primitive(): + + x = symbols('x') + + R = ZZ[x] + zero_poly = R(0) + cont, prim = zero_poly.primitive() + assert cont == 0 + assert prim == zero_poly + assert prim.is_primitive is False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootisolation.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootisolation.py new file mode 100644 index 0000000000000000000000000000000000000000..9661c1d6b63bfb941157c7e904ba4e048afbc538 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootisolation.py @@ -0,0 +1,823 @@ +"""Tests for real and complex root isolation and refinement algorithms. """ + +from sympy.polys.rings import ring +from sympy.polys.domains import ZZ, QQ, ZZ_I, EX +from sympy.polys.polyerrors import DomainError, RefinementFailed, PolynomialError +from sympy.polys.rootisolation import ( + dup_cauchy_upper_bound, dup_cauchy_lower_bound, + dup_mignotte_sep_bound_squared, +) +from sympy.testing.pytest import raises + +def test_dup_sturm(): + R, x = ring("x", QQ) + + assert R.dup_sturm(5) == [1] + assert R.dup_sturm(x) == [x, 1] + + f = x**3 - 2*x**2 + 3*x - 5 + assert R.dup_sturm(f) == [f, 3*x**2 - 4*x + 3, -QQ(10,9)*x + QQ(13,3), -QQ(3303,100)] + + +def test_dup_cauchy_upper_bound(): + raises(PolynomialError, lambda: dup_cauchy_upper_bound([], QQ)) + raises(PolynomialError, lambda: dup_cauchy_upper_bound([QQ(1)], QQ)) + raises(DomainError, lambda: dup_cauchy_upper_bound([ZZ_I(1), ZZ_I(1)], ZZ_I)) + + assert dup_cauchy_upper_bound([QQ(1), QQ(0), QQ(0)], QQ) == QQ.zero + assert dup_cauchy_upper_bound([QQ(1), QQ(0), QQ(-2)], QQ) == QQ(3) + + +def test_dup_cauchy_lower_bound(): + raises(PolynomialError, lambda: dup_cauchy_lower_bound([], QQ)) + raises(PolynomialError, lambda: dup_cauchy_lower_bound([QQ(1)], QQ)) + raises(PolynomialError, lambda: dup_cauchy_lower_bound([QQ(1), QQ(0), QQ(0)], QQ)) + raises(DomainError, lambda: dup_cauchy_lower_bound([ZZ_I(1), ZZ_I(1)], ZZ_I)) + + assert dup_cauchy_lower_bound([QQ(1), QQ(0), QQ(-2)], QQ) == QQ(2, 3) + + +def test_dup_mignotte_sep_bound_squared(): + raises(PolynomialError, lambda: dup_mignotte_sep_bound_squared([], QQ)) + raises(PolynomialError, lambda: dup_mignotte_sep_bound_squared([QQ(1)], QQ)) + + assert dup_mignotte_sep_bound_squared([QQ(1), QQ(0), QQ(-2)], QQ) == QQ(3, 5) + + +def test_dup_refine_real_root(): + R, x = ring("x", ZZ) + f = x**2 - 2 + + assert R.dup_refine_real_root(f, QQ(1), QQ(1), steps=1) == (QQ(1), QQ(1)) + assert R.dup_refine_real_root(f, QQ(1), QQ(1), steps=9) == (QQ(1), QQ(1)) + + raises(ValueError, lambda: R.dup_refine_real_root(f, QQ(-2), QQ(2))) + + s, t = QQ(1, 1), QQ(2, 1) + + assert R.dup_refine_real_root(f, s, t, steps=0) == (QQ(1, 1), QQ(2, 1)) + assert R.dup_refine_real_root(f, s, t, steps=1) == (QQ(1, 1), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=2) == (QQ(4, 3), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=3) == (QQ(7, 5), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=4) == (QQ(7, 5), QQ(10, 7)) + + s, t = QQ(1, 1), QQ(3, 2) + + assert R.dup_refine_real_root(f, s, t, steps=0) == (QQ(1, 1), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=1) == (QQ(4, 3), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=2) == (QQ(7, 5), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=3) == (QQ(7, 5), QQ(10, 7)) + assert R.dup_refine_real_root(f, s, t, steps=4) == (QQ(7, 5), QQ(17, 12)) + + s, t = QQ(1, 1), QQ(5, 3) + + assert R.dup_refine_real_root(f, s, t, steps=0) == (QQ(1, 1), QQ(5, 3)) + assert R.dup_refine_real_root(f, s, t, steps=1) == (QQ(1, 1), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=2) == (QQ(7, 5), QQ(3, 2)) + assert R.dup_refine_real_root(f, s, t, steps=3) == (QQ(7, 5), QQ(13, 9)) + assert R.dup_refine_real_root(f, s, t, steps=4) == (QQ(7, 5), QQ(27, 19)) + + s, t = QQ(-1, 1), QQ(-2, 1) + + assert R.dup_refine_real_root(f, s, t, steps=0) == (-QQ(2, 1), -QQ(1, 1)) + assert R.dup_refine_real_root(f, s, t, steps=1) == (-QQ(3, 2), -QQ(1, 1)) + assert R.dup_refine_real_root(f, s, t, steps=2) == (-QQ(3, 2), -QQ(4, 3)) + assert R.dup_refine_real_root(f, s, t, steps=3) == (-QQ(3, 2), -QQ(7, 5)) + assert R.dup_refine_real_root(f, s, t, steps=4) == (-QQ(10, 7), -QQ(7, 5)) + + raises(RefinementFailed, lambda: R.dup_refine_real_root(f, QQ(0), QQ(1))) + + s, t, u, v, w = QQ(1), QQ(2), QQ(24, 17), QQ(17, 12), QQ(7, 5) + + assert R.dup_refine_real_root(f, s, t, eps=QQ(1, 100)) == (u, v) + assert R.dup_refine_real_root(f, s, t, steps=6) == (u, v) + + assert R.dup_refine_real_root(f, s, t, eps=QQ(1, 100), steps=5) == (w, v) + assert R.dup_refine_real_root(f, s, t, eps=QQ(1, 100), steps=6) == (u, v) + assert R.dup_refine_real_root(f, s, t, eps=QQ(1, 100), steps=7) == (u, v) + + s, t, u, v = QQ(-2), QQ(-1), QQ(-3, 2), QQ(-4, 3) + + assert R.dup_refine_real_root(f, s, t, disjoint=QQ(-5)) == (s, t) + assert R.dup_refine_real_root(f, s, t, disjoint=-v) == (s, t) + assert R.dup_refine_real_root(f, s, t, disjoint=v) == (u, v) + + s, t, u, v = QQ(1), QQ(2), QQ(4, 3), QQ(3, 2) + + assert R.dup_refine_real_root(f, s, t, disjoint=QQ(5)) == (s, t) + assert R.dup_refine_real_root(f, s, t, disjoint=-u) == (s, t) + assert R.dup_refine_real_root(f, s, t, disjoint=u) == (u, v) + + +def test_dup_isolate_real_roots_sqf(): + R, x = ring("x", ZZ) + + assert R.dup_isolate_real_roots_sqf(0) == [] + assert R.dup_isolate_real_roots_sqf(5) == [] + + assert R.dup_isolate_real_roots_sqf(x**2 + x) == [(-1, -1), (0, 0)] + assert R.dup_isolate_real_roots_sqf(x**2 - x) == [( 0, 0), (1, 1)] + + assert R.dup_isolate_real_roots_sqf(x**4 + x + 1) == [] + + I = [(-2, -1), (1, 2)] + + assert R.dup_isolate_real_roots_sqf(x**2 - 2) == I + assert R.dup_isolate_real_roots_sqf(-x**2 + 2) == I + + assert R.dup_isolate_real_roots_sqf(x - 1) == \ + [(1, 1)] + assert R.dup_isolate_real_roots_sqf(x**2 - 3*x + 2) == \ + [(1, 1), (2, 2)] + assert R.dup_isolate_real_roots_sqf(x**3 - 6*x**2 + 11*x - 6) == \ + [(1, 1), (2, 2), (3, 3)] + assert R.dup_isolate_real_roots_sqf(x**4 - 10*x**3 + 35*x**2 - 50*x + 24) == \ + [(1, 1), (2, 2), (3, 3), (4, 4)] + assert R.dup_isolate_real_roots_sqf(x**5 - 15*x**4 + 85*x**3 - 225*x**2 + 274*x - 120) == \ + [(1, 1), (2, 2), (3, 3), (4, 4), (5, 5)] + + assert R.dup_isolate_real_roots_sqf(x - 10) == \ + [(10, 10)] + assert R.dup_isolate_real_roots_sqf(x**2 - 30*x + 200) == \ + [(10, 10), (20, 20)] + assert R.dup_isolate_real_roots_sqf(x**3 - 60*x**2 + 1100*x - 6000) == \ + [(10, 10), (20, 20), (30, 30)] + assert R.dup_isolate_real_roots_sqf(x**4 - 100*x**3 + 3500*x**2 - 50000*x + 240000) == \ + [(10, 10), (20, 20), (30, 30), (40, 40)] + assert R.dup_isolate_real_roots_sqf(x**5 - 150*x**4 + 8500*x**3 - 225000*x**2 + 2740000*x - 12000000) == \ + [(10, 10), (20, 20), (30, 30), (40, 40), (50, 50)] + + assert R.dup_isolate_real_roots_sqf(x + 1) == \ + [(-1, -1)] + assert R.dup_isolate_real_roots_sqf(x**2 + 3*x + 2) == \ + [(-2, -2), (-1, -1)] + assert R.dup_isolate_real_roots_sqf(x**3 + 6*x**2 + 11*x + 6) == \ + [(-3, -3), (-2, -2), (-1, -1)] + assert R.dup_isolate_real_roots_sqf(x**4 + 10*x**3 + 35*x**2 + 50*x + 24) == \ + [(-4, -4), (-3, -3), (-2, -2), (-1, -1)] + assert R.dup_isolate_real_roots_sqf(x**5 + 15*x**4 + 85*x**3 + 225*x**2 + 274*x + 120) == \ + [(-5, -5), (-4, -4), (-3, -3), (-2, -2), (-1, -1)] + + assert R.dup_isolate_real_roots_sqf(x + 10) == \ + [(-10, -10)] + assert R.dup_isolate_real_roots_sqf(x**2 + 30*x + 200) == \ + [(-20, -20), (-10, -10)] + assert R.dup_isolate_real_roots_sqf(x**3 + 60*x**2 + 1100*x + 6000) == \ + [(-30, -30), (-20, -20), (-10, -10)] + assert R.dup_isolate_real_roots_sqf(x**4 + 100*x**3 + 3500*x**2 + 50000*x + 240000) == \ + [(-40, -40), (-30, -30), (-20, -20), (-10, -10)] + assert R.dup_isolate_real_roots_sqf(x**5 + 150*x**4 + 8500*x**3 + 225000*x**2 + 2740000*x + 12000000) == \ + [(-50, -50), (-40, -40), (-30, -30), (-20, -20), (-10, -10)] + + assert R.dup_isolate_real_roots_sqf(x**2 - 5) == [(-3, -2), (2, 3)] + assert R.dup_isolate_real_roots_sqf(x**3 - 5) == [(1, 2)] + assert R.dup_isolate_real_roots_sqf(x**4 - 5) == [(-2, -1), (1, 2)] + assert R.dup_isolate_real_roots_sqf(x**5 - 5) == [(1, 2)] + assert R.dup_isolate_real_roots_sqf(x**6 - 5) == [(-2, -1), (1, 2)] + assert R.dup_isolate_real_roots_sqf(x**7 - 5) == [(1, 2)] + assert R.dup_isolate_real_roots_sqf(x**8 - 5) == [(-2, -1), (1, 2)] + assert R.dup_isolate_real_roots_sqf(x**9 - 5) == [(1, 2)] + + assert R.dup_isolate_real_roots_sqf(x**2 - 1) == \ + [(-1, -1), (1, 1)] + assert R.dup_isolate_real_roots_sqf(x**3 + 2*x**2 - x - 2) == \ + [(-2, -2), (-1, -1), (1, 1)] + assert R.dup_isolate_real_roots_sqf(x**4 - 5*x**2 + 4) == \ + [(-2, -2), (-1, -1), (1, 1), (2, 2)] + assert R.dup_isolate_real_roots_sqf(x**5 + 3*x**4 - 5*x**3 - 15*x**2 + 4*x + 12) == \ + [(-3, -3), (-2, -2), (-1, -1), (1, 1), (2, 2)] + assert R.dup_isolate_real_roots_sqf(x**6 - 14*x**4 + 49*x**2 - 36) == \ + [(-3, -3), (-2, -2), (-1, -1), (1, 1), (2, 2), (3, 3)] + assert R.dup_isolate_real_roots_sqf(2*x**7 + x**6 - 28*x**5 - 14*x**4 + 98*x**3 + 49*x**2 - 72*x - 36) == \ + [(-3, -3), (-2, -2), (-1, -1), (-1, 0), (1, 1), (2, 2), (3, 3)] + assert R.dup_isolate_real_roots_sqf(4*x**8 - 57*x**6 + 210*x**4 - 193*x**2 + 36) == \ + [(-3, -3), (-2, -2), (-1, -1), (-1, 0), (0, 1), (1, 1), (2, 2), (3, 3)] + + f = 9*x**2 - 2 + + assert R.dup_isolate_real_roots_sqf(f) == \ + [(-1, 0), (0, 1)] + + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 10)) == \ + [(QQ(-1, 2), QQ(-3, 7)), (QQ(3, 7), QQ(1, 2))] + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 100)) == \ + [(QQ(-9, 19), QQ(-8, 17)), (QQ(8, 17), QQ(9, 19))] + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 1000)) == \ + [(QQ(-33, 70), QQ(-8, 17)), (QQ(8, 17), QQ(33, 70))] + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 10000)) == \ + [(QQ(-33, 70), QQ(-107, 227)), (QQ(107, 227), QQ(33, 70))] + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 100000)) == \ + [(QQ(-305, 647), QQ(-272, 577)), (QQ(272, 577), QQ(305, 647))] + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 1000000)) == \ + [(QQ(-1121, 2378), QQ(-272, 577)), (QQ(272, 577), QQ(1121, 2378))] + + f = 200100012*x**5 - 700390052*x**4 + 700490079*x**3 - 200240054*x**2 + 40017*x - 2 + + assert R.dup_isolate_real_roots_sqf(f) == \ + [(QQ(0), QQ(1, 10002)), (QQ(1, 10002), QQ(1, 10002)), + (QQ(1, 2), QQ(1, 2)), (QQ(1), QQ(1)), (QQ(2), QQ(2))] + + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 100000)) == \ + [(QQ(1, 10003), QQ(1, 10003)), (QQ(1, 10002), QQ(1, 10002)), + (QQ(1, 2), QQ(1, 2)), (QQ(1), QQ(1)), (QQ(2), QQ(2))] + + a, b, c, d = 10000090000001, 2000100003, 10000300007, 10000005000008 + + f = 20001600074001600021*x**4 \ + + 1700135866278935491773999857*x**3 \ + - 2000179008931031182161141026995283662899200197*x**2 \ + - 800027600594323913802305066986600025*x \ + + 100000950000540000725000008 + + assert R.dup_isolate_real_roots_sqf(f) == \ + [(-a, -a), (-1, 0), (0, 1), (d, d)] + + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 100000000000)) == \ + [(-QQ(a), -QQ(a)), (-QQ(1, b), -QQ(1, b)), (QQ(1, c), QQ(1, c)), (QQ(d), QQ(d))] + + (u, v), B, C, (s, t) = R.dup_isolate_real_roots_sqf(f, fast=True) + + assert u < -a < v and B == (-QQ(1), QQ(0)) and C == (QQ(0), QQ(1)) and s < d < t + + assert R.dup_isolate_real_roots_sqf(f, fast=True, eps=QQ(1, 100000000000000000000000000000)) == \ + [(-QQ(a), -QQ(a)), (-QQ(1, b), -QQ(1, b)), (QQ(1, c), QQ(1, c)), (QQ(d), QQ(d))] + + f = -10*x**4 + 8*x**3 + 80*x**2 - 32*x - 160 + + assert R.dup_isolate_real_roots_sqf(f) == \ + [(-2, -2), (-2, -1), (2, 2), (2, 3)] + + assert R.dup_isolate_real_roots_sqf(f, eps=QQ(1, 100)) == \ + [(-QQ(2), -QQ(2)), (-QQ(23, 14), -QQ(18, 11)), (QQ(2), QQ(2)), (QQ(39, 16), QQ(22, 9))] + + f = x - 1 + + assert R.dup_isolate_real_roots_sqf(f, inf=2) == [] + assert R.dup_isolate_real_roots_sqf(f, sup=0) == [] + + assert R.dup_isolate_real_roots_sqf(f) == [(1, 1)] + assert R.dup_isolate_real_roots_sqf(f, inf=1) == [(1, 1)] + assert R.dup_isolate_real_roots_sqf(f, sup=1) == [(1, 1)] + assert R.dup_isolate_real_roots_sqf(f, inf=1, sup=1) == [(1, 1)] + + f = x**2 - 2 + + assert R.dup_isolate_real_roots_sqf(f, inf=QQ(7, 4)) == [] + assert R.dup_isolate_real_roots_sqf(f, inf=QQ(7, 5)) == [(QQ(7, 5), QQ(3, 2))] + assert R.dup_isolate_real_roots_sqf(f, sup=QQ(7, 5)) == [(-2, -1)] + assert R.dup_isolate_real_roots_sqf(f, sup=QQ(7, 4)) == [(-2, -1), (1, QQ(3, 2))] + assert R.dup_isolate_real_roots_sqf(f, sup=-QQ(7, 4)) == [] + assert R.dup_isolate_real_roots_sqf(f, sup=-QQ(7, 5)) == [(-QQ(3, 2), -QQ(7, 5))] + assert R.dup_isolate_real_roots_sqf(f, inf=-QQ(7, 5)) == [(1, 2)] + assert R.dup_isolate_real_roots_sqf(f, inf=-QQ(7, 4)) == [(-QQ(3, 2), -1), (1, 2)] + + I = [(-2, -1), (1, 2)] + + assert R.dup_isolate_real_roots_sqf(f, inf=-2) == I + assert R.dup_isolate_real_roots_sqf(f, sup=+2) == I + + assert R.dup_isolate_real_roots_sqf(f, inf=-2, sup=2) == I + + R, x = ring("x", QQ) + f = QQ(8, 5)*x**2 - QQ(87374, 3855)*x - QQ(17, 771) + + assert R.dup_isolate_real_roots_sqf(f) == [(-1, 0), (14, 15)] + + R, x = ring("x", EX) + raises(DomainError, lambda: R.dup_isolate_real_roots_sqf(x + 3)) + +def test_dup_isolate_real_roots(): + R, x = ring("x", ZZ) + + assert R.dup_isolate_real_roots(0) == [] + assert R.dup_isolate_real_roots(3) == [] + + assert R.dup_isolate_real_roots(5*x) == [((0, 0), 1)] + assert R.dup_isolate_real_roots(7*x**4) == [((0, 0), 4)] + + assert R.dup_isolate_real_roots(x**2 + x) == [((-1, -1), 1), ((0, 0), 1)] + assert R.dup_isolate_real_roots(x**2 - x) == [((0, 0), 1), ((1, 1), 1)] + + assert R.dup_isolate_real_roots(x**4 + x + 1) == [] + + I = [((-2, -1), 1), ((1, 2), 1)] + + assert R.dup_isolate_real_roots(x**2 - 2) == I + assert R.dup_isolate_real_roots(-x**2 + 2) == I + + f = 16*x**14 - 96*x**13 + 24*x**12 + 936*x**11 - 1599*x**10 - 2880*x**9 + 9196*x**8 \ + + 552*x**7 - 21831*x**6 + 13968*x**5 + 21690*x**4 - 26784*x**3 - 2916*x**2 + 15552*x - 5832 + g = R.dup_sqf_part(f) + + assert R.dup_isolate_real_roots(f) == \ + [((-QQ(2), -QQ(3, 2)), 2), ((-QQ(3, 2), -QQ(1, 1)), 3), ((QQ(1), QQ(3, 2)), 3), + ((QQ(3, 2), QQ(3, 2)), 4), ((QQ(5, 3), QQ(2)), 2)] + + assert R.dup_isolate_real_roots_sqf(g) == \ + [(-QQ(2), -QQ(3, 2)), (-QQ(3, 2), -QQ(1, 1)), (QQ(1), QQ(3, 2)), + (QQ(3, 2), QQ(3, 2)), (QQ(3, 2), QQ(2))] + assert R.dup_isolate_real_roots(g) == \ + [((-QQ(2), -QQ(3, 2)), 1), ((-QQ(3, 2), -QQ(1, 1)), 1), ((QQ(1), QQ(3, 2)), 1), + ((QQ(3, 2), QQ(3, 2)), 1), ((QQ(3, 2), QQ(2)), 1)] + + f = x - 1 + + assert R.dup_isolate_real_roots(f, inf=2) == [] + assert R.dup_isolate_real_roots(f, sup=0) == [] + + assert R.dup_isolate_real_roots(f) == [((1, 1), 1)] + assert R.dup_isolate_real_roots(f, inf=1) == [((1, 1), 1)] + assert R.dup_isolate_real_roots(f, sup=1) == [((1, 1), 1)] + assert R.dup_isolate_real_roots(f, inf=1, sup=1) == [((1, 1), 1)] + + f = x**4 - 4*x**2 + 4 + + assert R.dup_isolate_real_roots(f, inf=QQ(7, 4)) == [] + assert R.dup_isolate_real_roots(f, inf=QQ(7, 5)) == [((QQ(7, 5), QQ(3, 2)), 2)] + assert R.dup_isolate_real_roots(f, sup=QQ(7, 5)) == [((-2, -1), 2)] + assert R.dup_isolate_real_roots(f, sup=QQ(7, 4)) == [((-2, -1), 2), ((1, QQ(3, 2)), 2)] + assert R.dup_isolate_real_roots(f, sup=-QQ(7, 4)) == [] + assert R.dup_isolate_real_roots(f, sup=-QQ(7, 5)) == [((-QQ(3, 2), -QQ(7, 5)), 2)] + assert R.dup_isolate_real_roots(f, inf=-QQ(7, 5)) == [((1, 2), 2)] + assert R.dup_isolate_real_roots(f, inf=-QQ(7, 4)) == [((-QQ(3, 2), -1), 2), ((1, 2), 2)] + + I = [((-2, -1), 2), ((1, 2), 2)] + + assert R.dup_isolate_real_roots(f, inf=-2) == I + assert R.dup_isolate_real_roots(f, sup=+2) == I + + assert R.dup_isolate_real_roots(f, inf=-2, sup=2) == I + + f = x**11 - 3*x**10 - x**9 + 11*x**8 - 8*x**7 - 8*x**6 + 12*x**5 - 4*x**4 + + assert R.dup_isolate_real_roots(f, basis=False) == \ + [((-2, -1), 2), ((0, 0), 4), ((1, 1), 3), ((1, 2), 2)] + assert R.dup_isolate_real_roots(f, basis=True) == \ + [((-2, -1), 2, [1, 0, -2]), ((0, 0), 4, [1, 0]), ((1, 1), 3, [1, -1]), ((1, 2), 2, [1, 0, -2])] + + f = (x**45 - 45*x**44 + 990*x**43 - 1) + g = (x**46 - 15180*x**43 + 9366819*x**40 - 53524680*x**39 + 260932815*x**38 - 1101716330*x**37 + 4076350421*x**36 - 13340783196*x**35 + 38910617655*x**34 - 101766230790*x**33 + 239877544005*x**32 - 511738760544*x**31 + 991493848554*x**30 - 1749695026860*x**29 + 2818953098830*x**28 - 4154246671960*x**27 + 5608233007146*x**26 - 6943526580276*x**25 + 7890371113950*x**24 - 8233430727600*x**23 + 7890371113950*x**22 - 6943526580276*x**21 + 5608233007146*x**20 - 4154246671960*x**19 + 2818953098830*x**18 - 1749695026860*x**17 + 991493848554*x**16 - 511738760544*x**15 + 239877544005*x**14 - 101766230790*x**13 + 38910617655*x**12 - 13340783196*x**11 + 4076350421*x**10 - 1101716330*x**9 + 260932815*x**8 - 53524680*x**7 + 9366819*x**6 - 1370754*x**5 + 163185*x**4 - 15180*x**3 + 1035*x**2 - 47*x + 1) + + assert R.dup_isolate_real_roots(f*g) == \ + [((0, QQ(1, 2)), 1), ((QQ(2, 3), QQ(3, 4)), 1), ((QQ(3, 4), 1), 1), ((6, 7), 1), ((24, 25), 1)] + + R, x = ring("x", EX) + raises(DomainError, lambda: R.dup_isolate_real_roots(x + 3)) + + +def test_dup_isolate_real_roots_list(): + R, x = ring("x", ZZ) + + assert R.dup_isolate_real_roots_list([x**2 + x, x]) == \ + [((-1, -1), {0: 1}), ((0, 0), {0: 1, 1: 1})] + assert R.dup_isolate_real_roots_list([x**2 - x, x]) == \ + [((0, 0), {0: 1, 1: 1}), ((1, 1), {0: 1})] + + assert R.dup_isolate_real_roots_list([x + 1, x + 2, x - 1, x + 1, x - 1, x - 1]) == \ + [((-QQ(2), -QQ(2)), {1: 1}), ((-QQ(1), -QQ(1)), {0: 1, 3: 1}), ((QQ(1), QQ(1)), {2: 1, 4: 1, 5: 1})] + + assert R.dup_isolate_real_roots_list([x + 1, x + 2, x - 1, x + 1, x - 1, x + 2]) == \ + [((-QQ(2), -QQ(2)), {1: 1, 5: 1}), ((-QQ(1), -QQ(1)), {0: 1, 3: 1}), ((QQ(1), QQ(1)), {2: 1, 4: 1})] + + f, g = x**4 - 4*x**2 + 4, x - 1 + + assert R.dup_isolate_real_roots_list([f, g], inf=QQ(7, 4)) == [] + assert R.dup_isolate_real_roots_list([f, g], inf=QQ(7, 5)) == \ + [((QQ(7, 5), QQ(3, 2)), {0: 2})] + assert R.dup_isolate_real_roots_list([f, g], sup=QQ(7, 5)) == \ + [((-2, -1), {0: 2}), ((1, 1), {1: 1})] + assert R.dup_isolate_real_roots_list([f, g], sup=QQ(7, 4)) == \ + [((-2, -1), {0: 2}), ((1, 1), {1: 1}), ((1, QQ(3, 2)), {0: 2})] + assert R.dup_isolate_real_roots_list([f, g], sup=-QQ(7, 4)) == [] + assert R.dup_isolate_real_roots_list([f, g], sup=-QQ(7, 5)) == \ + [((-QQ(3, 2), -QQ(7, 5)), {0: 2})] + assert R.dup_isolate_real_roots_list([f, g], inf=-QQ(7, 5)) == \ + [((1, 1), {1: 1}), ((1, 2), {0: 2})] + assert R.dup_isolate_real_roots_list([f, g], inf=-QQ(7, 4)) == \ + [((-QQ(3, 2), -1), {0: 2}), ((1, 1), {1: 1}), ((1, 2), {0: 2})] + + f, g = 2*x**2 - 1, x**2 - 2 + + assert R.dup_isolate_real_roots_list([f, g]) == \ + [((-QQ(2), -QQ(1)), {1: 1}), ((-QQ(1), QQ(0)), {0: 1}), + ((QQ(0), QQ(1)), {0: 1}), ((QQ(1), QQ(2)), {1: 1})] + assert R.dup_isolate_real_roots_list([f, g], strict=True) == \ + [((-QQ(3, 2), -QQ(4, 3)), {1: 1}), ((-QQ(1), -QQ(2, 3)), {0: 1}), + ((QQ(2, 3), QQ(1)), {0: 1}), ((QQ(4, 3), QQ(3, 2)), {1: 1})] + + f, g = x**2 - 2, x**3 - x**2 - 2*x + 2 + + assert R.dup_isolate_real_roots_list([f, g]) == \ + [((-QQ(2), -QQ(1)), {1: 1, 0: 1}), ((QQ(1), QQ(1)), {1: 1}), ((QQ(1), QQ(2)), {1: 1, 0: 1})] + + f, g = x**3 - 2*x, x**5 - x**4 - 2*x**3 + 2*x**2 + + assert R.dup_isolate_real_roots_list([f, g]) == \ + [((-QQ(2), -QQ(1)), {1: 1, 0: 1}), ((QQ(0), QQ(0)), {0: 1, 1: 2}), + ((QQ(1), QQ(1)), {1: 1}), ((QQ(1), QQ(2)), {1: 1, 0: 1})] + + f, g = x**9 - 3*x**8 - x**7 + 11*x**6 - 8*x**5 - 8*x**4 + 12*x**3 - 4*x**2, x**5 - 2*x**4 + 3*x**3 - 4*x**2 + 2*x + + assert R.dup_isolate_real_roots_list([f, g], basis=False) == \ + [((-2, -1), {0: 2}), ((0, 0), {0: 2, 1: 1}), ((1, 1), {0: 3, 1: 2}), ((1, 2), {0: 2})] + assert R.dup_isolate_real_roots_list([f, g], basis=True) == \ + [((-2, -1), {0: 2}, [1, 0, -2]), ((0, 0), {0: 2, 1: 1}, [1, 0]), + ((1, 1), {0: 3, 1: 2}, [1, -1]), ((1, 2), {0: 2}, [1, 0, -2])] + + R, x = ring("x", EX) + raises(DomainError, lambda: R.dup_isolate_real_roots_list([x + 3])) + + +def test_dup_isolate_real_roots_list_QQ(): + R, x = ring("x", ZZ) + + f = x**5 - 200 + g = x**5 - 201 + + assert R.dup_isolate_real_roots_list([f, g]) == \ + [((QQ(75, 26), QQ(101, 35)), {0: 1}), ((QQ(309, 107), QQ(26, 9)), {1: 1})] + + R, x = ring("x", QQ) + + f = -QQ(1, 200)*x**5 + 1 + g = -QQ(1, 201)*x**5 + 1 + + assert R.dup_isolate_real_roots_list([f, g]) == \ + [((QQ(75, 26), QQ(101, 35)), {0: 1}), ((QQ(309, 107), QQ(26, 9)), {1: 1})] + + +def test_dup_count_real_roots(): + R, x = ring("x", ZZ) + + assert R.dup_count_real_roots(0) == 0 + assert R.dup_count_real_roots(7) == 0 + + f = x - 1 + assert R.dup_count_real_roots(f) == 1 + assert R.dup_count_real_roots(f, inf=1) == 1 + assert R.dup_count_real_roots(f, sup=0) == 0 + assert R.dup_count_real_roots(f, sup=1) == 1 + assert R.dup_count_real_roots(f, inf=0, sup=1) == 1 + assert R.dup_count_real_roots(f, inf=0, sup=2) == 1 + assert R.dup_count_real_roots(f, inf=1, sup=2) == 1 + + f = x**2 - 2 + assert R.dup_count_real_roots(f) == 2 + assert R.dup_count_real_roots(f, sup=0) == 1 + assert R.dup_count_real_roots(f, inf=-1, sup=1) == 0 + + +# parameters for test_dup_count_complex_roots_n(): n = 1..8 +a, b = (-QQ(1), -QQ(1)), (QQ(1), QQ(1)) +c, d = ( QQ(0), QQ(0)), (QQ(1), QQ(1)) + +def test_dup_count_complex_roots_1(): + R, x = ring("x", ZZ) + + # z-1 + f = x - 1 + assert R.dup_count_complex_roots(f, a, b) == 1 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # z+1 + f = x + 1 + assert R.dup_count_complex_roots(f, a, b) == 1 + assert R.dup_count_complex_roots(f, c, d) == 0 + + +def test_dup_count_complex_roots_2(): + R, x = ring("x", ZZ) + + # (z-1)*(z) + f = x**2 - x + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-1)*(-z) + f = -x**2 + x + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z+1)*(z) + f = x**2 + x + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z+1)*(-z) + f = -x**2 - x + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 1 + + +def test_dup_count_complex_roots_3(): + R, x = ring("x", ZZ) + + # (z-1)*(z+1) + f = x**2 - 1 + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-1)*(z+1)*(z) + f = x**3 - x + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-1)*(z+1)*(-z) + f = -x**3 + x + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + +def test_dup_count_complex_roots_4(): + R, x = ring("x", ZZ) + + # (z-I)*(z+I) + f = x**2 + 1 + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I)*(z+I)*(z) + f = x**3 + x + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I)*(z+I)*(-z) + f = -x**3 - x + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I)*(z+I)*(z-1) + f = x**3 - x**2 + x - 1 + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I)*(z+I)*(z-1)*(z) + f = x**4 - x**3 + x**2 - x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I)*(z+I)*(z-1)*(-z) + f = -x**4 + x**3 - x**2 + x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I)*(z+I)*(z-1)*(z+1) + f = x**4 - 1 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I)*(z+I)*(z-1)*(z+1)*(z) + f = x**5 - x + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I)*(z+I)*(z-1)*(z+1)*(-z) + f = -x**5 + x + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 3 + + +def test_dup_count_complex_roots_5(): + R, x = ring("x", ZZ) + + # (z-I+1)*(z+I+1) + f = x**2 + 2*x + 2 + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 0 + + # (z-I+1)*(z+I+1)*(z-1) + f = x**3 + x**2 - 2 + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I+1)*(z+I+1)*(z-1)*z + f = x**4 + x**3 - 2*x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I+1)*(z+I+1)*(z+1) + f = x**3 + 3*x**2 + 4*x + 2 + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 0 + + # (z-I+1)*(z+I+1)*(z+1)*z + f = x**4 + 3*x**3 + 4*x**2 + 2*x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I+1)*(z+I+1)*(z-1)*(z+1) + f = x**4 + 2*x**3 + x**2 - 2*x - 2 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I+1)*(z+I+1)*(z-1)*(z+1)*z + f = x**5 + 2*x**4 + x**3 - 2*x**2 - 2*x + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 2 + + +def test_dup_count_complex_roots_6(): + R, x = ring("x", ZZ) + + # (z-I-1)*(z+I-1) + f = x**2 - 2*x + 2 + assert R.dup_count_complex_roots(f, a, b) == 2 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z-1) + f = x**3 - 3*x**2 + 4*x - 2 + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-1)*z + f = x**4 - 3*x**3 + 4*x**2 - 2*x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I-1)*(z+I-1)*(z+1) + f = x**3 - x**2 + 2 + assert R.dup_count_complex_roots(f, a, b) == 3 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z+1)*z + f = x**4 - x**3 + 2*x + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-1)*(z+1) + f = x**4 - 2*x**3 + x**2 + 2*x - 2 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-1)*(z+1)*z + f = x**5 - 2*x**4 + x**3 + 2*x**2 - 2*x + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 3 + + +def test_dup_count_complex_roots_7(): + R, x = ring("x", ZZ) + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1) + f = x**4 + 4 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-2) + f = x**5 - 2*x**4 + 4*x - 8 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z**2-2) + f = x**6 - 2*x**4 + 4*x**2 - 8 + assert R.dup_count_complex_roots(f, a, b) == 4 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1) + f = x**5 - x**4 + 4*x - 4 + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*z + f = x**6 - x**5 + 4*x**2 - 4*x + assert R.dup_count_complex_roots(f, a, b) == 6 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z+1) + f = x**5 + x**4 + 4*x + 4 + assert R.dup_count_complex_roots(f, a, b) == 5 + assert R.dup_count_complex_roots(f, c, d) == 1 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z+1)*z + f = x**6 + x**5 + 4*x**2 + 4*x + assert R.dup_count_complex_roots(f, a, b) == 6 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*(z+1) + f = x**6 - x**4 + 4*x**2 - 4 + assert R.dup_count_complex_roots(f, a, b) == 6 + assert R.dup_count_complex_roots(f, c, d) == 2 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*(z+1)*z + f = x**7 - x**5 + 4*x**3 - 4*x + assert R.dup_count_complex_roots(f, a, b) == 7 + assert R.dup_count_complex_roots(f, c, d) == 3 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*(z+1)*(z-I)*(z+I) + f = x**8 + 3*x**4 - 4 + assert R.dup_count_complex_roots(f, a, b) == 8 + assert R.dup_count_complex_roots(f, c, d) == 3 + + +def test_dup_count_complex_roots_8(): + R, x = ring("x", ZZ) + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*(z+1)*(z-I)*(z+I)*z + f = x**9 + 3*x**5 - 4*x + assert R.dup_count_complex_roots(f, a, b) == 9 + assert R.dup_count_complex_roots(f, c, d) == 4 + + # (z-I-1)*(z+I-1)*(z-I+1)*(z+I+1)*(z-1)*(z+1)*(z-I)*(z+I)*(z**2-2)*z + f = x**11 - 2*x**9 + 3*x**7 - 6*x**5 - 4*x**3 + 8*x + assert R.dup_count_complex_roots(f, a, b) == 9 + assert R.dup_count_complex_roots(f, c, d) == 4 + + +def test_dup_count_complex_roots_implicit(): + R, x = ring("x", ZZ) + + # z*(z-1)*(z+1)*(z-I)*(z+I) + f = x**5 - x + + assert R.dup_count_complex_roots(f) == 5 + + assert R.dup_count_complex_roots(f, sup=(0, 0)) == 3 + assert R.dup_count_complex_roots(f, inf=(0, 0)) == 3 + + +def test_dup_count_complex_roots_exclude(): + R, x = ring("x", ZZ) + + # z*(z-1)*(z+1)*(z-I)*(z+I) + f = x**5 - x + + a, b = (-QQ(1), QQ(0)), (QQ(1), QQ(1)) + + assert R.dup_count_complex_roots(f, a, b) == 4 + + assert R.dup_count_complex_roots(f, a, b, exclude=['S']) == 3 + assert R.dup_count_complex_roots(f, a, b, exclude=['N']) == 3 + + assert R.dup_count_complex_roots(f, a, b, exclude=['S', 'N']) == 2 + + assert R.dup_count_complex_roots(f, a, b, exclude=['E']) == 4 + assert R.dup_count_complex_roots(f, a, b, exclude=['W']) == 4 + + assert R.dup_count_complex_roots(f, a, b, exclude=['E', 'W']) == 4 + + assert R.dup_count_complex_roots(f, a, b, exclude=['N', 'S', 'E', 'W']) == 2 + + assert R.dup_count_complex_roots(f, a, b, exclude=['SW']) == 3 + assert R.dup_count_complex_roots(f, a, b, exclude=['SE']) == 3 + + assert R.dup_count_complex_roots(f, a, b, exclude=['SW', 'SE']) == 2 + assert R.dup_count_complex_roots(f, a, b, exclude=['SW', 'SE', 'S']) == 1 + assert R.dup_count_complex_roots(f, a, b, exclude=['SW', 'SE', 'S', 'N']) == 0 + + a, b = (QQ(0), QQ(0)), (QQ(1), QQ(1)) + + assert R.dup_count_complex_roots(f, a, b, exclude=True) == 1 + + +def test_dup_isolate_complex_roots_sqf(): + R, x = ring("x", ZZ) + f = x**2 - 2*x + 3 + + assert R.dup_isolate_complex_roots_sqf(f) == \ + [((0, -6), (6, 0)), ((0, 0), (6, 6))] + assert [ r.as_tuple() for r in R.dup_isolate_complex_roots_sqf(f, blackbox=True) ] == \ + [((0, -6), (6, 0)), ((0, 0), (6, 6))] + + assert R.dup_isolate_complex_roots_sqf(f, eps=QQ(1, 10)) == \ + [((QQ(15, 16), -QQ(3, 2)), (QQ(33, 32), -QQ(45, 32))), + ((QQ(15, 16), QQ(45, 32)), (QQ(33, 32), QQ(3, 2)))] + assert R.dup_isolate_complex_roots_sqf(f, eps=QQ(1, 100)) == \ + [((QQ(255, 256), -QQ(363, 256)), (QQ(513, 512), -QQ(723, 512))), + ((QQ(255, 256), QQ(723, 512)), (QQ(513, 512), QQ(363, 256)))] + + f = 7*x**4 - 19*x**3 + 20*x**2 + 17*x + 20 + + assert R.dup_isolate_complex_roots_sqf(f) == \ + [((-QQ(40, 7), -QQ(40, 7)), (0, 0)), ((-QQ(40, 7), 0), (0, QQ(40, 7))), + ((0, -QQ(40, 7)), (QQ(40, 7), 0)), ((0, 0), (QQ(40, 7), QQ(40, 7)))] + + +def test_dup_isolate_all_roots_sqf(): + R, x = ring("x", ZZ) + f = 4*x**4 - x**3 + 2*x**2 + 5*x + + assert R.dup_isolate_all_roots_sqf(f) == \ + ([(-1, 0), (0, 0)], + [((0, -QQ(5, 2)), (QQ(5, 2), 0)), ((0, 0), (QQ(5, 2), QQ(5, 2)))]) + + assert R.dup_isolate_all_roots_sqf(f, eps=QQ(1, 10)) == \ + ([(QQ(-7, 8), QQ(-6, 7)), (0, 0)], + [((QQ(35, 64), -QQ(35, 32)), (QQ(5, 8), -QQ(65, 64))), ((QQ(35, 64), QQ(65, 64)), (QQ(5, 8), QQ(35, 32)))]) + + +def test_dup_isolate_all_roots(): + R, x = ring("x", ZZ) + f = 4*x**4 - x**3 + 2*x**2 + 5*x + + assert R.dup_isolate_all_roots(f) == \ + ([((-1, 0), 1), ((0, 0), 1)], + [(((0, -QQ(5, 2)), (QQ(5, 2), 0)), 1), + (((0, 0), (QQ(5, 2), QQ(5, 2))), 1)]) + + assert R.dup_isolate_all_roots(f, eps=QQ(1, 10)) == \ + ([((QQ(-7, 8), QQ(-6, 7)), 1), ((0, 0), 1)], + [(((QQ(35, 64), -QQ(35, 32)), (QQ(5, 8), -QQ(65, 64))), 1), + (((QQ(35, 64), QQ(65, 64)), (QQ(5, 8), QQ(35, 32))), 1)]) + + f = x**5 + x**4 - 2*x**3 - 2*x**2 + x + 1 + raises(NotImplementedError, lambda: R.dup_isolate_all_roots(f)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootoftools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootoftools.py new file mode 100644 index 0000000000000000000000000000000000000000..de9dbcabd0a7e2bed0c5adb7127041b4be058379 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_rootoftools.py @@ -0,0 +1,697 @@ +"""Tests for the implementation of RootOf class and related tools. """ + +from sympy.polys.polytools import Poly +import sympy.polys.rootoftools as rootoftools +from sympy.polys.rootoftools import (rootof, RootOf, CRootOf, RootSum, + _pure_key_dict as D) + +from sympy.polys.polyerrors import ( + MultivariatePolynomialError, + GeneratorsNeeded, + PolynomialError, +) + +from sympy.core.function import (Function, Lambda) +from sympy.core.numbers import (Float, I, Rational) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import tan +from sympy.integrals.integrals import Integral +from sympy.polys.orthopolys import legendre_poly +from sympy.solvers.solvers import solve + + +from sympy.testing.pytest import raises, slow +from sympy.core.expr import unchanged + +from sympy.abc import a, b, x, y, z, r + + +def test_CRootOf___new__(): + assert rootof(x, 0) == 0 + assert rootof(x, -1) == 0 + + assert rootof(x, S.Zero) == 0 + + assert rootof(x - 1, 0) == 1 + assert rootof(x - 1, -1) == 1 + + assert rootof(x + 1, 0) == -1 + assert rootof(x + 1, -1) == -1 + + assert rootof(x**2 + 2*x + 3, 0) == -1 - I*sqrt(2) + assert rootof(x**2 + 2*x + 3, 1) == -1 + I*sqrt(2) + assert rootof(x**2 + 2*x + 3, -1) == -1 + I*sqrt(2) + assert rootof(x**2 + 2*x + 3, -2) == -1 - I*sqrt(2) + + r = rootof(x**2 + 2*x + 3, 0, radicals=False) + assert isinstance(r, RootOf) is True + + r = rootof(x**2 + 2*x + 3, 1, radicals=False) + assert isinstance(r, RootOf) is True + + r = rootof(x**2 + 2*x + 3, -1, radicals=False) + assert isinstance(r, RootOf) is True + + r = rootof(x**2 + 2*x + 3, -2, radicals=False) + assert isinstance(r, RootOf) is True + + assert rootof((x - 1)*(x + 1), 0, radicals=False) == -1 + assert rootof((x - 1)*(x + 1), 1, radicals=False) == 1 + assert rootof((x - 1)*(x + 1), -1, radicals=False) == 1 + assert rootof((x - 1)*(x + 1), -2, radicals=False) == -1 + + assert rootof((x - 1)*(x + 1), 0, radicals=True) == -1 + assert rootof((x - 1)*(x + 1), 1, radicals=True) == 1 + assert rootof((x - 1)*(x + 1), -1, radicals=True) == 1 + assert rootof((x - 1)*(x + 1), -2, radicals=True) == -1 + + assert rootof((x - 1)*(x**3 + x + 3), 0) == rootof(x**3 + x + 3, 0) + assert rootof((x - 1)*(x**3 + x + 3), 1) == 1 + assert rootof((x - 1)*(x**3 + x + 3), 2) == rootof(x**3 + x + 3, 1) + assert rootof((x - 1)*(x**3 + x + 3), 3) == rootof(x**3 + x + 3, 2) + assert rootof((x - 1)*(x**3 + x + 3), -1) == rootof(x**3 + x + 3, 2) + assert rootof((x - 1)*(x**3 + x + 3), -2) == rootof(x**3 + x + 3, 1) + assert rootof((x - 1)*(x**3 + x + 3), -3) == 1 + assert rootof((x - 1)*(x**3 + x + 3), -4) == rootof(x**3 + x + 3, 0) + + assert rootof(x**4 + 3*x**3, 0) == -3 + assert rootof(x**4 + 3*x**3, 1) == 0 + assert rootof(x**4 + 3*x**3, 2) == 0 + assert rootof(x**4 + 3*x**3, 3) == 0 + + raises(GeneratorsNeeded, lambda: rootof(0, 0)) + raises(GeneratorsNeeded, lambda: rootof(1, 0)) + + raises(PolynomialError, lambda: rootof(Poly(0, x), 0)) + raises(PolynomialError, lambda: rootof(Poly(1, x), 0)) + raises(PolynomialError, lambda: rootof(x - y, 0)) + # issue 8617 + raises(PolynomialError, lambda: rootof(exp(x), 0)) + + raises(NotImplementedError, lambda: rootof(x**3 - x + sqrt(2), 0)) + raises(NotImplementedError, lambda: rootof(x**3 - x + I, 0)) + + raises(IndexError, lambda: rootof(x**2 - 1, -4)) + raises(IndexError, lambda: rootof(x**2 - 1, -3)) + raises(IndexError, lambda: rootof(x**2 - 1, 2)) + raises(IndexError, lambda: rootof(x**2 - 1, 3)) + raises(ValueError, lambda: rootof(x**2 - 1, x)) + + assert rootof(Poly(x - y, x), 0) == y + + assert rootof(Poly(x**2 - y, x), 0) == -sqrt(y) + assert rootof(Poly(x**2 - y, x), 1) == sqrt(y) + + assert rootof(Poly(x**3 - y, x), 0) == y**Rational(1, 3) + + assert rootof(y*x**3 + y*x + 2*y, x, 0) == -1 + raises(NotImplementedError, lambda: rootof(x**3 + x + 2*y, x, 0)) + + assert rootof(x**3 + x + 1, 0).is_commutative is True + + +def test_CRootOf_attributes(): + r = rootof(x**3 + x + 3, 0) + assert r.is_number + assert r.free_symbols == set() + # if the following assertion fails then multivariate polynomials + # are apparently supported and the RootOf.free_symbols routine + # should be changed to return whatever symbols would not be + # the PurePoly dummy symbol + raises(NotImplementedError, lambda: rootof(Poly(x**3 + y*x + 1, x), 0)) + + +def test_CRootOf___eq__(): + assert (rootof(x**3 + x + 3, 0) == rootof(x**3 + x + 3, 0)) is True + assert (rootof(x**3 + x + 3, 0) == rootof(x**3 + x + 3, 1)) is False + assert (rootof(x**3 + x + 3, 1) == rootof(x**3 + x + 3, 1)) is True + assert (rootof(x**3 + x + 3, 1) == rootof(x**3 + x + 3, 2)) is False + assert (rootof(x**3 + x + 3, 2) == rootof(x**3 + x + 3, 2)) is True + + assert (rootof(x**3 + x + 3, 0) == rootof(y**3 + y + 3, 0)) is True + assert (rootof(x**3 + x + 3, 0) == rootof(y**3 + y + 3, 1)) is False + assert (rootof(x**3 + x + 3, 1) == rootof(y**3 + y + 3, 1)) is True + assert (rootof(x**3 + x + 3, 1) == rootof(y**3 + y + 3, 2)) is False + assert (rootof(x**3 + x + 3, 2) == rootof(y**3 + y + 3, 2)) is True + + +def test_CRootOf___eval_Eq__(): + f = Function('f') + eq = x**3 + x + 3 + r = rootof(eq, 2) + r1 = rootof(eq, 1) + assert Eq(r, r1) is S.false + assert Eq(r, r) is S.true + assert unchanged(Eq, r, x) + assert Eq(r, 0) is S.false + assert Eq(r, S.Infinity) is S.false + assert Eq(r, I) is S.false + assert unchanged(Eq, r, f(0)) + sol = solve(eq) + for s in sol: + if s.is_real: + assert Eq(r, s) is S.false + r = rootof(eq, 0) + for s in sol: + if s.is_real: + assert Eq(r, s) is S.true + eq = x**3 + x + 1 + sol = solve(eq) + assert [Eq(rootof(eq, i), j) for i in range(3) for j in sol + ].count(True) == 3 + assert Eq(rootof(eq, 0), 1 + S.ImaginaryUnit) == False + + +def test_CRootOf_is_real(): + assert rootof(x**3 + x + 3, 0).is_real is True + assert rootof(x**3 + x + 3, 1).is_real is False + assert rootof(x**3 + x + 3, 2).is_real is False + + +def test_CRootOf_is_complex(): + assert rootof(x**3 + x + 3, 0).is_complex is True + + +def test_CRootOf_is_algebraic(): + assert rootof(x**3 + x + 3, 0).is_algebraic is True + assert rootof(x**3 + x + 3, 1).is_algebraic is True + assert rootof(x**3 + x + 3, 2).is_algebraic is True + + +def test_CRootOf_subs(): + assert rootof(x**3 + x + 1, 0).subs(x, y) == rootof(y**3 + y + 1, 0) + + +def test_CRootOf_diff(): + assert rootof(x**3 + x + 1, 0).diff(x) == 0 + assert rootof(x**3 + x + 1, 0).diff(y) == 0 + +@slow +def test_CRootOf_evalf(): + real = rootof(x**3 + x + 3, 0).evalf(n=20) + + assert real.epsilon_eq(Float("-1.2134116627622296341")) + + re, im = rootof(x**3 + x + 3, 1).evalf(n=20).as_real_imag() + + assert re.epsilon_eq( Float("0.60670583138111481707")) + assert im.epsilon_eq(-Float("1.45061224918844152650")) + + re, im = rootof(x**3 + x + 3, 2).evalf(n=20).as_real_imag() + + assert re.epsilon_eq(Float("0.60670583138111481707")) + assert im.epsilon_eq(Float("1.45061224918844152650")) + + p = legendre_poly(4, x, polys=True) + roots = [str(r.n(17)) for r in p.real_roots()] + # magnitudes are given by + # sqrt(3/S(7) - 2*sqrt(6/S(5))/7) + # and + # sqrt(3/S(7) + 2*sqrt(6/S(5))/7) + assert roots == [ + "-0.86113631159405258", + "-0.33998104358485626", + "0.33998104358485626", + "0.86113631159405258", + ] + + re = rootof(x**5 - 5*x + 12, 0).evalf(n=20) + assert re.epsilon_eq(Float("-1.84208596619025438271")) + + re, im = rootof(x**5 - 5*x + 12, 1).evalf(n=20).as_real_imag() + assert re.epsilon_eq(Float("-0.351854240827371999559")) + assert im.epsilon_eq(Float("-1.709561043370328882010")) + + re, im = rootof(x**5 - 5*x + 12, 2).evalf(n=20).as_real_imag() + assert re.epsilon_eq(Float("-0.351854240827371999559")) + assert im.epsilon_eq(Float("+1.709561043370328882010")) + + re, im = rootof(x**5 - 5*x + 12, 3).evalf(n=20).as_real_imag() + assert re.epsilon_eq(Float("+1.272897223922499190910")) + assert im.epsilon_eq(Float("-0.719798681483861386681")) + + re, im = rootof(x**5 - 5*x + 12, 4).evalf(n=20).as_real_imag() + assert re.epsilon_eq(Float("+1.272897223922499190910")) + assert im.epsilon_eq(Float("+0.719798681483861386681")) + + # issue 6393 + assert str(rootof(x**5 + 2*x**4 + x**3 - 68719476736, 0).n(3)) == '147.' + eq = (531441*x**11 + 3857868*x**10 + 13730229*x**9 + 32597882*x**8 + + 55077472*x**7 + 60452000*x**6 + 32172064*x**5 - 4383808*x**4 - + 11942912*x**3 - 1506304*x**2 + 1453312*x + 512) + a, b = rootof(eq, 1).n(2).as_real_imag() + c, d = rootof(eq, 2).n(2).as_real_imag() + assert a == c + assert b < d + assert b == -d + # issue 6451 + r = rootof(legendre_poly(64, x), 7) + assert r.n(2) == r.n(100).n(2) + # issue 9019 + r0 = rootof(x**2 + 1, 0, radicals=False) + r1 = rootof(x**2 + 1, 1, radicals=False) + assert r0.n(4) == Float(-1.0, 4) * I + assert r1.n(4) == Float(1.0, 4) * I + + # make sure verification is used in case a max/min traps the "root" + assert str(rootof(4*x**5 + 16*x**3 + 12*x**2 + 7, 0).n(3)) == '-0.976' + + # watch out for UnboundLocalError + c = CRootOf(90720*x**6 - 4032*x**4 + 84*x**2 - 1, 0) + assert c._eval_evalf(2) # doesn't fail + + # watch out for imaginary parts that don't want to evaluate + assert str(RootOf(x**16 + 32*x**14 + 508*x**12 + 5440*x**10 + + 39510*x**8 + 204320*x**6 + 755548*x**4 + 1434496*x**2 + + 877969, 10).n(2)) == '-3.4*I' + assert abs(RootOf(x**4 + 10*x**2 + 1, 0).n(2)) < 0.4 + + # check reset and args + r = [RootOf(x**3 + x + 3, i) for i in range(3)] + r[0]._reset() + for ri in r: + i = ri._get_interval() + ri.n(2) + assert i != ri._get_interval() + ri._reset() + assert i == ri._get_interval() + assert i == i.func(*i.args) + + +def test_issue_24978(): + # Irreducible poly with negative leading coeff is normalized + # (factor of -1 is extracted), before being stored as CRootOf.poly. + f = -x**2 + 2 + r = CRootOf(f, 0) + assert r.poly.as_expr() == x**2 - 2 + # An action that prompts calculation of an interval puts r.poly in + # the cache. + r.n() + assert r.poly in rootoftools._reals_cache + + +def test_CRootOf_evalf_caching_bug(): + r = rootof(x**5 - 5*x + 12, 1) + r.n() + a = r._get_interval() + r = rootof(x**5 - 5*x + 12, 1) + r.n() + b = r._get_interval() + assert a == b + + +def test_CRootOf_real_roots(): + assert Poly(x**5 + x + 1).real_roots() == [rootof(x**3 - x**2 + 1, 0)] + assert Poly(x**5 + x + 1).real_roots(radicals=False) == [rootof( + x**3 - x**2 + 1, 0)] + + # https://github.com/sympy/sympy/issues/20902 + p = Poly(-3*x**4 - 10*x**3 - 12*x**2 - 6*x - 1, x, domain='ZZ') + assert CRootOf.real_roots(p) == [S(-1), S(-1), S(-1), S(-1)/3] + + # with real algebraic coefficients + assert Poly(x**3 + sqrt(2)*x**2 - 1, x, extension=True).real_roots() == [ + rootof(x**6 - 2*x**4 - 2*x**3 + 1, 0) + ] + assert Poly(x**5 + sqrt(2) * x**3 - 1, x, extension=True).real_roots() == [ + rootof(x**10 - 2*x**6 - 2*x**5 + 1, 0) + ] + r = rootof(y**5 + y**3 - 1, 0) + assert Poly(x**5 + r*x - 1, x, extension=True).real_roots() ==\ + [ + rootof(x**25 - 5*x**20 + x**17 + 10*x**15 - 3*x**12 - + 10*x**10 + 3*x**7 + 6*x**5 - x**2 - 1, 0) + ] + # roots with multiplicity + assert Poly((x-1) * (x-sqrt(2))**2, x, extension=True).real_roots() ==\ + [ + S(1), sqrt(2), sqrt(2) + ] + + +def test_CRootOf_all_roots(): + assert Poly(x**5 + x + 1).all_roots() == [ + rootof(x**3 - x**2 + 1, 0), + Rational(-1, 2) - sqrt(3)*I/2, + Rational(-1, 2) + sqrt(3)*I/2, + rootof(x**3 - x**2 + 1, 1), + rootof(x**3 - x**2 + 1, 2), + ] + + assert Poly(x**5 + x + 1).all_roots(radicals=False) == [ + rootof(x**3 - x**2 + 1, 0), + rootof(x**2 + x + 1, 0, radicals=False), + rootof(x**2 + x + 1, 1, radicals=False), + rootof(x**3 - x**2 + 1, 1), + rootof(x**3 - x**2 + 1, 2), + ] + + # with real algebraic coefficients + assert Poly(x**3 + sqrt(2)*x**2 - 1, x, extension=True).all_roots() ==\ + [ + rootof(x**6 - 2*x**4 - 2*x**3 + 1, 0), + rootof(x**6 - 2*x**4 - 2*x**3 + 1, 2), + rootof(x**6 - 2*x**4 - 2*x**3 + 1, 3) + ] + # roots with multiplicity + assert Poly((x-1) * (x-sqrt(2))**2 * (x-I) * (x+I), x, extension=True).all_roots() ==\ + [ + S(1), sqrt(2), sqrt(2), -I, I + ] + + # imaginary algebraic coeffs (gaussian domain) + assert Poly(x**2 - I/2, x, extension=True).all_roots() ==\ + [ + S(1)/2 + I/2, + -S(1)/2 - I/2 + ] + + +def test_CRootOf_eval_rational(): + p = legendre_poly(4, x, polys=True) + roots = [r.eval_rational(n=18) for r in p.real_roots()] + for root in roots: + assert isinstance(root, Rational) + roots = [str(root.n(17)) for root in roots] + assert roots == [ + "-0.86113631159405258", + "-0.33998104358485626", + "0.33998104358485626", + "0.86113631159405258", + ] + + +def test_CRootOf_lazy(): + # irreducible poly with both real and complex roots: + f = Poly(x**3 + 2*x + 2) + + # real root: + CRootOf.clear_cache() + r = CRootOf(f, 0) + # Not yet in cache, after construction: + assert r.poly not in rootoftools._reals_cache + assert r.poly not in rootoftools._complexes_cache + r.evalf() + # In cache after evaluation: + assert r.poly in rootoftools._reals_cache + assert r.poly not in rootoftools._complexes_cache + + # complex root: + CRootOf.clear_cache() + r = CRootOf(f, 1) + # Not yet in cache, after construction: + assert r.poly not in rootoftools._reals_cache + assert r.poly not in rootoftools._complexes_cache + r.evalf() + # In cache after evaluation: + assert r.poly in rootoftools._reals_cache + assert r.poly in rootoftools._complexes_cache + + # composite poly with both real and complex roots: + f = Poly((x**2 - 2)*(x**2 + 1)) + + # real root: + CRootOf.clear_cache() + r = CRootOf(f, 0) + # In cache immediately after construction: + assert r.poly in rootoftools._reals_cache + assert r.poly not in rootoftools._complexes_cache + + # complex root: + CRootOf.clear_cache() + r = CRootOf(f, 2) + # In cache immediately after construction: + assert r.poly in rootoftools._reals_cache + assert r.poly in rootoftools._complexes_cache + + +def test_RootSum___new__(): + f = x**3 + x + 3 + + g = Lambda(r, log(r*x)) + s = RootSum(f, g) + + assert isinstance(s, RootSum) is True + + assert RootSum(f**2, g) == 2*RootSum(f, g) + assert RootSum((x - 7)*f**3, g) == log(7*x) + 3*RootSum(f, g) + + # issue 5571 + assert hash(RootSum((x - 7)*f**3, g)) == hash(log(7*x) + 3*RootSum(f, g)) + + raises(MultivariatePolynomialError, lambda: RootSum(x**3 + x + y)) + raises(ValueError, lambda: RootSum(x**2 + 3, lambda x: x)) + + assert RootSum(f, exp) == RootSum(f, Lambda(x, exp(x))) + assert RootSum(f, log) == RootSum(f, Lambda(x, log(x))) + + assert isinstance(RootSum(f, auto=False), RootSum) is True + + assert RootSum(f) == 0 + assert RootSum(f, Lambda(x, x)) == 0 + assert RootSum(f, Lambda(x, x**2)) == -2 + + assert RootSum(f, Lambda(x, 1)) == 3 + assert RootSum(f, Lambda(x, 2)) == 6 + + assert RootSum(f, auto=False).is_commutative is True + + assert RootSum(f, Lambda(x, 1/(x + x**2))) == Rational(11, 3) + assert RootSum(f, Lambda(x, y/(x + x**2))) == Rational(11, 3)*y + + assert RootSum(x**2 - 1, Lambda(x, 3*x**2), x) == 6 + assert RootSum(x**2 - y, Lambda(x, 3*x**2), x) == 6*y + + assert RootSum(x**2 - 1, Lambda(x, z*x**2), x) == 2*z + assert RootSum(x**2 - y, Lambda(x, z*x**2), x) == 2*z*y + + assert RootSum( + x**2 - 1, Lambda(x, exp(x)), quadratic=True) == exp(-1) + exp(1) + + assert RootSum(x**3 + a*x + a**3, tan, x) == \ + RootSum(x**3 + x + 1, Lambda(x, tan(a*x))) + assert RootSum(a**3*x**3 + a*x + 1, tan, x) == \ + RootSum(x**3 + x + 1, Lambda(x, tan(x/a))) + + +def test_RootSum_free_symbols(): + assert RootSum(x**3 + x + 3, Lambda(r, exp(r))).free_symbols == set() + assert RootSum(x**3 + x + 3, Lambda(r, exp(a*r))).free_symbols == {a} + assert RootSum( + x**3 + x + y, Lambda(r, exp(a*r)), x).free_symbols == {a, y} + + +def test_RootSum___eq__(): + f = Lambda(x, exp(x)) + + assert (RootSum(x**3 + x + 1, f) == RootSum(x**3 + x + 1, f)) is True + assert (RootSum(x**3 + x + 1, f) == RootSum(y**3 + y + 1, f)) is True + + assert (RootSum(x**3 + x + 1, f) == RootSum(x**3 + x + 2, f)) is False + assert (RootSum(x**3 + x + 1, f) == RootSum(y**3 + y + 2, f)) is False + + +def test_RootSum_doit(): + rs = RootSum(x**2 + 1, exp) + + assert isinstance(rs, RootSum) is True + assert rs.doit() == exp(-I) + exp(I) + + rs = RootSum(x**2 + a, exp, x) + + assert isinstance(rs, RootSum) is True + assert rs.doit() == exp(-sqrt(-a)) + exp(sqrt(-a)) + + +def test_RootSum_evalf(): + rs = RootSum(x**2 + 1, exp) + + assert rs.evalf(n=20, chop=True).epsilon_eq(Float("1.0806046117362794348")) + assert rs.evalf(n=15, chop=True).epsilon_eq(Float("1.08060461173628")) + + rs = RootSum(x**2 + a, exp, x) + + assert rs.evalf() == rs + + +def test_RootSum_diff(): + f = x**3 + x + 3 + + g = Lambda(r, exp(r*x)) + h = Lambda(r, r*exp(r*x)) + + assert RootSum(f, g).diff(x) == RootSum(f, h) + + +def test_RootSum_subs(): + f = x**3 + x + 3 + g = Lambda(r, exp(r*x)) + + F = y**3 + y + 3 + G = Lambda(r, exp(r*y)) + + assert RootSum(f, g).subs(y, 1) == RootSum(f, g) + assert RootSum(f, g).subs(x, y) == RootSum(F, G) + + +def test_RootSum_rational(): + assert RootSum( + z**5 - z + 1, Lambda(z, z/(x - z))) == (4*x - 5)/(x**5 - x + 1) + + f = 161*z**3 + 115*z**2 + 19*z + 1 + g = Lambda(z, z*log( + -3381*z**4/4 - 3381*z**3/4 - 625*z**2/2 - z*Rational(125, 2) - 5 + exp(x))) + + assert RootSum(f, g).diff(x) == -( + (5*exp(2*x) - 6*exp(x) + 4)*exp(x)/(exp(3*x) - exp(2*x) + 1))/7 + + +def test_RootSum_independent(): + f = (x**3 - a)**2*(x**4 - b)**3 + + g = Lambda(x, 5*tan(x) + 7) + h = Lambda(x, tan(x)) + + r0 = RootSum(x**3 - a, h, x) + r1 = RootSum(x**4 - b, h, x) + + assert RootSum(f, g, x).as_ordered_terms() == [10*r0, 15*r1, 126] + + +def test_issue_7876(): + l1 = Poly(x**6 - x + 1, x).all_roots() + l2 = [rootof(x**6 - x + 1, i) for i in range(6)] + assert frozenset(l1) == frozenset(l2) + + +def test_issue_8316(): + f = Poly(7*x**8 - 9) + assert len(f.all_roots()) == 8 + f = Poly(7*x**8 - 10) + assert len(f.all_roots()) == 8 + + +def test__imag_count(): + from sympy.polys.rootoftools import _imag_count_of_factor + def imag_count(p): + return sum(_imag_count_of_factor(f)*m for f, m in + p.factor_list()[1]) + assert imag_count(Poly(x**6 + 10*x**2 + 1)) == 2 + assert imag_count(Poly(x**2)) == 0 + assert imag_count(Poly([1]*3 + [-1], x)) == 0 + assert imag_count(Poly(x**3 + 1)) == 0 + assert imag_count(Poly(x**2 + 1)) == 2 + assert imag_count(Poly(x**2 - 1)) == 0 + assert imag_count(Poly(x**4 - 1)) == 2 + assert imag_count(Poly(x**4 + 1)) == 0 + assert imag_count(Poly([1, 2, 3], x)) == 0 + assert imag_count(Poly(x**3 + x + 1)) == 0 + assert imag_count(Poly(x**4 + x + 1)) == 0 + def q(r1, r2, p): + return Poly(((x - r1)*(x - r2)).subs(x, x**p), x) + assert imag_count(q(-1, -2, 2)) == 4 + assert imag_count(q(-1, 2, 2)) == 2 + assert imag_count(q(1, 2, 2)) == 0 + assert imag_count(q(1, 2, 4)) == 4 + assert imag_count(q(-1, 2, 4)) == 2 + assert imag_count(q(-1, -2, 4)) == 0 + + +def test_RootOf_is_imaginary(): + r = RootOf(x**4 + 4*x**2 + 1, 1) + i = r._get_interval() + assert r.is_imaginary and i.ax*i.bx <= 0 + + +def test_is_disjoint(): + eq = x**3 + 5*x + 1 + ir = rootof(eq, 0)._get_interval() + ii = rootof(eq, 1)._get_interval() + assert ir.is_disjoint(ii) + assert ii.is_disjoint(ir) + + +def test_pure_key_dict(): + p = D() + assert (x in p) is False + assert (1 in p) is False + p[x] = 1 + assert x in p + assert y in p + assert p[y] == 1 + raises(KeyError, lambda: p[1]) + def dont(k): + p[k] = 2 + raises(ValueError, lambda: dont(1)) + + +@slow +def test_eval_approx_relative(): + CRootOf.clear_cache() + t = [CRootOf(x**3 + 10*x + 1, i) for i in range(3)] + assert [i.eval_rational(1e-1) for i in t] == [ + Rational(-21, 220), Rational(15, 256) - I*805/256, + Rational(15, 256) + I*805/256] + t[0]._reset() + assert [i.eval_rational(1e-1, 1e-4) for i in t] == [ + Rational(-21, 220), Rational(3275, 65536) - I*414645/131072, + Rational(3275, 65536) + I*414645/131072] + assert S(t[0]._get_interval().dx) < 1e-1 + assert S(t[1]._get_interval().dx) < 1e-1 + assert S(t[1]._get_interval().dy) < 1e-4 + assert S(t[2]._get_interval().dx) < 1e-1 + assert S(t[2]._get_interval().dy) < 1e-4 + t[0]._reset() + assert [i.eval_rational(1e-4, 1e-4) for i in t] == [ + Rational(-2001, 20020), Rational(6545, 131072) - I*414645/131072, + Rational(6545, 131072) + I*414645/131072] + assert S(t[0]._get_interval().dx) < 1e-4 + assert S(t[1]._get_interval().dx) < 1e-4 + assert S(t[1]._get_interval().dy) < 1e-4 + assert S(t[2]._get_interval().dx) < 1e-4 + assert S(t[2]._get_interval().dy) < 1e-4 + # in the following, the actual relative precision is + # less than tested, but it should never be greater + t[0]._reset() + assert [i.eval_rational(n=2) for i in t] == [ + Rational(-202201, 2024022), Rational(104755, 2097152) - I*6634255/2097152, + Rational(104755, 2097152) + I*6634255/2097152] + assert abs(S(t[0]._get_interval().dx)/t[0]) < 1e-2 + assert abs(S(t[1]._get_interval().dx)/t[1]).n() < 1e-2 + assert abs(S(t[1]._get_interval().dy)/t[1]).n() < 1e-2 + assert abs(S(t[2]._get_interval().dx)/t[2]).n() < 1e-2 + assert abs(S(t[2]._get_interval().dy)/t[2]).n() < 1e-2 + t[0]._reset() + assert [i.eval_rational(n=3) for i in t] == [ + Rational(-202201, 2024022), Rational(1676045, 33554432) - I*106148135/33554432, + Rational(1676045, 33554432) + I*106148135/33554432] + assert abs(S(t[0]._get_interval().dx)/t[0]) < 1e-3 + assert abs(S(t[1]._get_interval().dx)/t[1]).n() < 1e-3 + assert abs(S(t[1]._get_interval().dy)/t[1]).n() < 1e-3 + assert abs(S(t[2]._get_interval().dx)/t[2]).n() < 1e-3 + assert abs(S(t[2]._get_interval().dy)/t[2]).n() < 1e-3 + + t[0]._reset() + a = [i.eval_approx(2) for i in t] + assert [str(i) for i in a] == [ + '-0.10', '0.05 - 3.2*I', '0.05 + 3.2*I'] + assert all(abs(((a[i] - t[i])/t[i]).n()) < 1e-2 for i in range(len(a))) + + +def test_issue_15920(): + r = rootof(x**5 - x + 1, 0) + p = Integral(x, (x, 1, y)) + assert unchanged(Eq, r, p) + + +def test_issue_19113(): + eq = y**3 - y + 1 + # generator is a canonical x in RootOf + assert str(Poly(eq).real_roots()) == '[CRootOf(x**3 - x + 1, 0)]' + assert str(Poly(eq.subs(y, tan(y))).real_roots() + ) == '[CRootOf(x**3 - x + 1, 0)]' + assert str(Poly(eq.subs(y, tan(x))).real_roots() + ) == '[CRootOf(x**3 - x + 1, 0)]' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_solvers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..bf8708314466b6a8676ba1a4438eb84924d0030c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_solvers.py @@ -0,0 +1,112 @@ +"""Tests for low-level linear systems solver. """ + +from sympy.matrices import Matrix +from sympy.polys.domains import ZZ, QQ +from sympy.polys.fields import field +from sympy.polys.rings import ring +from sympy.polys.solvers import solve_lin_sys, eqs_to_matrix + + +def test_solve_lin_sys_2x2_one(): + domain, x1,x2 = ring("x1,x2", QQ) + eqs = [x1 + x2 - 5, + 2*x1 - x2] + sol = {x1: QQ(5, 3), x2: QQ(10, 3)} + _sol = solve_lin_sys(eqs, domain) + assert _sol == sol and all(s.ring == domain for s in _sol) + +def test_solve_lin_sys_2x4_none(): + domain, x1,x2 = ring("x1,x2", QQ) + eqs = [x1 - 1, + x1 - x2, + x1 - 2*x2, + x2 - 1] + assert solve_lin_sys(eqs, domain) is None + + +def test_solve_lin_sys_3x4_one(): + domain, x1,x2,x3 = ring("x1,x2,x3", QQ) + eqs = [x1 + 2*x2 + 3*x3, + 2*x1 - x2 + x3, + 3*x1 + x2 + x3, + 5*x2 + 2*x3] + sol = {x1: 0, x2: 0, x3: 0} + assert solve_lin_sys(eqs, domain) == sol + +def test_solve_lin_sys_3x3_inf(): + domain, x1,x2,x3 = ring("x1,x2,x3", QQ) + eqs = [x1 - x2 + 2*x3 - 1, + 2*x1 + x2 + x3 - 8, + x1 + x2 - 5] + sol = {x1: -x3 + 3, x2: x3 + 2} + assert solve_lin_sys(eqs, domain) == sol + +def test_solve_lin_sys_3x4_none(): + domain, x1,x2,x3,x4 = ring("x1,x2,x3,x4", QQ) + eqs = [2*x1 + x2 + 7*x3 - 7*x4 - 2, + -3*x1 + 4*x2 - 5*x3 - 6*x4 - 3, + x1 + x2 + 4*x3 - 5*x4 - 2] + assert solve_lin_sys(eqs, domain) is None + + +def test_solve_lin_sys_4x7_inf(): + domain, x1,x2,x3,x4,x5,x6,x7 = ring("x1,x2,x3,x4,x5,x6,x7", QQ) + eqs = [x1 + 4*x2 - x4 + 7*x6 - 9*x7 - 3, + 2*x1 + 8*x2 - x3 + 3*x4 + 9*x5 - 13*x6 + 7*x7 - 9, + 2*x3 - 3*x4 - 4*x5 + 12*x6 - 8*x7 - 1, + -x1 - 4*x2 + 2*x3 + 4*x4 + 8*x5 - 31*x6 + 37*x7 - 4] + sol = {x1: 4 - 4*x2 - 2*x5 - x6 + 3*x7, + x3: 2 - x5 + 3*x6 - 5*x7, + x4: 1 - 2*x5 + 6*x6 - 6*x7} + assert solve_lin_sys(eqs, domain) == sol + +def test_solve_lin_sys_5x5_inf(): + domain, x1,x2,x3,x4,x5 = ring("x1,x2,x3,x4,x5", QQ) + eqs = [x1 - x2 - 2*x3 + x4 + 11*x5 - 13, + x1 - x2 + x3 + x4 + 5*x5 - 16, + 2*x1 - 2*x2 + x4 + 10*x5 - 21, + 2*x1 - 2*x2 - x3 + 3*x4 + 20*x5 - 38, + 2*x1 - 2*x2 + x3 + x4 + 8*x5 - 22] + sol = {x1: 6 + x2 - 3*x5, + x3: 1 + 2*x5, + x4: 9 - 4*x5} + assert solve_lin_sys(eqs, domain) == sol + +def test_solve_lin_sys_6x6_1(): + ground, d,r,e,g,i,j,l,o,m,p,q = field("d,r,e,g,i,j,l,o,m,p,q", ZZ) + domain, c,f,h,k,n,b = ring("c,f,h,k,n,b", ground) + + eqs = [b + q/d - c/d, c*(1/d + 1/e + 1/g) - f/g - q/d, f*(1/g + 1/i + 1/j) - c/g - h/i, h*(1/i + 1/l + 1/m) - f/i - k/m, k*(1/m + 1/o + 1/p) - h/m - n/p, n/p - k/p] + sol = { + b: (e*i*l*q + e*i*m*q + e*i*o*q + e*j*l*q + e*j*m*q + e*j*o*q + e*l*m*q + e*l*o*q + g*i*l*q + g*i*m*q + g*i*o*q + g*j*l*q + g*j*m*q + g*j*o*q + g*l*m*q + g*l*o*q + i*j*l*q + i*j*m*q + i*j*o*q + j*l*m*q + j*l*o*q)/(-d*e*i*l - d*e*i*m - d*e*i*o - d*e*j*l - d*e*j*m - d*e*j*o - d*e*l*m - d*e*l*o - d*g*i*l - d*g*i*m - d*g*i*o - d*g*j*l - d*g*j*m - d*g*j*o - d*g*l*m - d*g*l*o - d*i*j*l - d*i*j*m - d*i*j*o - d*j*l*m - d*j*l*o - e*g*i*l - e*g*i*m - e*g*i*o - e*g*j*l - e*g*j*m - e*g*j*o - e*g*l*m - e*g*l*o - e*i*j*l - e*i*j*m - e*i*j*o - e*j*l*m - e*j*l*o), + c: (-e*g*i*l*q - e*g*i*m*q - e*g*i*o*q - e*g*j*l*q - e*g*j*m*q - e*g*j*o*q - e*g*l*m*q - e*g*l*o*q - e*i*j*l*q - e*i*j*m*q - e*i*j*o*q - e*j*l*m*q - e*j*l*o*q)/(-d*e*i*l - d*e*i*m - d*e*i*o - d*e*j*l - d*e*j*m - d*e*j*o - d*e*l*m - d*e*l*o - d*g*i*l - d*g*i*m - d*g*i*o - d*g*j*l - d*g*j*m - d*g*j*o - d*g*l*m - d*g*l*o - d*i*j*l - d*i*j*m - d*i*j*o - d*j*l*m - d*j*l*o - e*g*i*l - e*g*i*m - e*g*i*o - e*g*j*l - e*g*j*m - e*g*j*o - e*g*l*m - e*g*l*o - e*i*j*l - e*i*j*m - e*i*j*o - e*j*l*m - e*j*l*o), + f: (-e*i*j*l*q - e*i*j*m*q - e*i*j*o*q - e*j*l*m*q - e*j*l*o*q)/(-d*e*i*l - d*e*i*m - d*e*i*o - d*e*j*l - d*e*j*m - d*e*j*o - d*e*l*m - d*e*l*o - d*g*i*l - d*g*i*m - d*g*i*o - d*g*j*l - d*g*j*m - d*g*j*o - d*g*l*m - d*g*l*o - d*i*j*l - d*i*j*m - d*i*j*o - d*j*l*m - d*j*l*o - e*g*i*l - e*g*i*m - e*g*i*o - e*g*j*l - e*g*j*m - e*g*j*o - e*g*l*m - e*g*l*o - e*i*j*l - e*i*j*m - e*i*j*o - e*j*l*m - e*j*l*o), + h: (-e*j*l*m*q - e*j*l*o*q)/(-d*e*i*l - d*e*i*m - d*e*i*o - d*e*j*l - d*e*j*m - d*e*j*o - d*e*l*m - d*e*l*o - d*g*i*l - d*g*i*m - d*g*i*o - d*g*j*l - d*g*j*m - d*g*j*o - d*g*l*m - d*g*l*o - d*i*j*l - d*i*j*m - d*i*j*o - d*j*l*m - d*j*l*o - e*g*i*l - e*g*i*m - e*g*i*o - e*g*j*l - e*g*j*m - e*g*j*o - e*g*l*m - e*g*l*o - e*i*j*l - e*i*j*m - e*i*j*o - e*j*l*m - e*j*l*o), + k: e*j*l*o*q/(d*e*i*l + d*e*i*m + d*e*i*o + d*e*j*l + d*e*j*m + d*e*j*o + d*e*l*m + d*e*l*o + d*g*i*l + d*g*i*m + d*g*i*o + d*g*j*l + d*g*j*m + d*g*j*o + d*g*l*m + d*g*l*o + d*i*j*l + d*i*j*m + d*i*j*o + d*j*l*m + d*j*l*o + e*g*i*l + e*g*i*m + e*g*i*o + e*g*j*l + e*g*j*m + e*g*j*o + e*g*l*m + e*g*l*o + e*i*j*l + e*i*j*m + e*i*j*o + e*j*l*m + e*j*l*o), + n: e*j*l*o*q/(d*e*i*l + d*e*i*m + d*e*i*o + d*e*j*l + d*e*j*m + d*e*j*o + d*e*l*m + d*e*l*o + d*g*i*l + d*g*i*m + d*g*i*o + d*g*j*l + d*g*j*m + d*g*j*o + d*g*l*m + d*g*l*o + d*i*j*l + d*i*j*m + d*i*j*o + d*j*l*m + d*j*l*o + e*g*i*l + e*g*i*m + e*g*i*o + e*g*j*l + e*g*j*m + e*g*j*o + e*g*l*m + e*g*l*o + e*i*j*l + e*i*j*m + e*i*j*o + e*j*l*m + e*j*l*o), + } + + assert solve_lin_sys(eqs, domain) == sol + +def test_solve_lin_sys_6x6_2(): + ground, d,r,e,g,i,j,l,o,m,p,q = field("d,r,e,g,i,j,l,o,m,p,q", ZZ) + domain, c,f,h,k,n,b = ring("c,f,h,k,n,b", ground) + + eqs = [b + r/d - c/d, c*(1/d + 1/e + 1/g) - f/g - r/d, f*(1/g + 1/i + 1/j) - c/g - h/i, h*(1/i + 1/l + 1/m) - f/i - k/m, k*(1/m + 1/o + 1/p) - h/m - n/p, n*(1/p + 1/q) - k/p] + sol = { + b: -((l*q*e*o + l*q*g*o + i*m*q*e + i*l*q*e + i*l*p*e + i*j*o*q + j*e*o*q + g*j*o*q + i*e*o*q + g*i*o*q + e*l*o*p + e*l*m*p + e*l*m*o + e*i*o*p + e*i*m*p + e*i*m*o + e*i*l*o + j*e*o*p + j*e*m*q + j*e*m*p + j*e*m*o + j*l*m*q + j*l*m*p + j*l*m*o + i*j*m*p + i*j*m*o + i*j*l*q + i*j*l*o + i*j*m*q + j*l*o*p + j*e*l*o + g*j*o*p + g*j*m*q + g*j*m*p + i*j*l*p + i*j*o*p + j*e*l*q + j*e*l*p + j*l*o*q + g*j*m*o + g*j*l*q + g*j*l*p + g*j*l*o + g*l*o*p + g*l*m*p + g*l*m*o + g*i*m*o + g*i*o*p + g*i*m*q + g*i*m*p + g*i*l*q + g*i*l*p + g*i*l*o + l*m*q*e + l*m*q*g)*r)/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + c: (r*e*(l*q*g*o + i*j*o*q + g*j*o*q + g*i*o*q + j*l*m*q + j*l*m*p + j*l*m*o + i*j*m*p + i*j*m*o + i*j*l*q + i*j*l*o + i*j*m*q + j*l*o*p + g*j*o*p + g*j*m*q + g*j*m*p + i*j*l*p + i*j*o*p + j*l*o*q + g*j*m*o + g*j*l*q + g*j*l*p + g*j*l*o + g*l*o*p + g*l*m*p + g*l*m*o + g*i*m*o + g*i*o*p + g*i*m*q + g*i*m*p + g*i*l*q + g*i*l*p + g*i*l*o + l*m*q*g))/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + f: (r*e*j*(l*q*o + l*o*p + l*m*q + l*m*p + l*m*o + i*o*q + i*o*p + i*m*q + i*m*p + i*m*o + i*l*q + i*l*p + i*l*o))/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + h: (j*e*r*l*(o*q + o*p + m*q + m*p + m*o))/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + k: (j*e*r*o*l*(q + p))/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + n: (j*e*r*o*q*l)/(l*q*d*e*o + l*q*d*g*o + l*q*e*g*o + i*j*d*o*q + i*j*e*o*q + j*d*e*o*q + g*j*d*o*q + g*j*e*o*q + g*i*e*o*q + i*d*e*o*q + g*i*d*o*q + g*i*d*o*p + g*i*d*m*q + g*i*d*m*p + g*i*d*m*o + g*i*d*l*q + g*i*d*l*p + g*i*d*l*o + g*e*l*m*p + g*e*l*o*p + g*j*e*l*q + g*e*l*m*o + g*j*e*m*p + g*j*e*m*o + d*e*l*m*p + d*e*l*m*o + i*d*e*m*p + g*j*e*l*p + g*j*e*l*o + d*e*l*o*p + i*j*d*l*o + i*j*e*o*p + i*j*e*m*q + i*j*d*m*q + i*j*d*m*p + i*j*d*m*o + i*j*d*l*q + i*j*d*l*p + i*j*e*m*p + i*j*e*m*o + i*j*e*l*q + i*j*e*l*p + i*j*e*l*o + i*d*e*m*q + i*d*e*m*o + i*d*e*l*q + i*d*e*l*p + j*d*l*o*p + j*d*e*l*o + g*j*d*o*p + g*j*d*m*q + g*j*d*m*p + g*j*d*m*o + g*j*d*l*q + g*j*d*l*p + g*j*d*l*o + g*j*e*o*p + g*j*e*m*q + g*d*l*o*p + g*d*l*m*p + g*d*l*m*o + j*d*e*m*p + i*d*e*o*p + j*e*o*q*l + j*e*o*p*l + j*e*m*q*l + j*d*e*o*p + j*d*e*m*q + i*j*d*o*p + g*i*e*o*p + j*d*e*m*o + j*d*e*l*q + j*d*e*l*p + j*e*m*p*l + j*e*m*o*l + g*i*e*m*q + g*i*e*m*p + g*i*e*m*o + g*i*e*l*q + g*i*e*l*p + g*i*e*l*o + j*d*l*o*q + j*d*l*m*q + j*d*l*m*p + j*d*l*m*o + i*d*e*l*o + l*m*q*d*e + l*m*q*d*g + l*m*q*e*g), + } + + assert solve_lin_sys(eqs, domain) == sol + +def test_eqs_to_matrix(): + domain, x1,x2 = ring("x1,x2", QQ) + eqs_coeff = [{x1: QQ(1), x2: QQ(1)}, {x1: QQ(2), x2: QQ(-1)}] + eqs_rhs = [QQ(-5), QQ(0)] + M = eqs_to_matrix(eqs_coeff, eqs_rhs, [x1, x2], QQ) + assert M.to_Matrix() == Matrix([[1, 1, 5], [2, -1, 0]]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_specialpolys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_specialpolys.py new file mode 100644 index 0000000000000000000000000000000000000000..39f551c9e70b5c2bae748ea681b9c8a8cb349fe1 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_specialpolys.py @@ -0,0 +1,152 @@ +"""Tests for functions for generating interesting polynomials. """ + +from sympy.core.add import Add +from sympy.core.symbol import symbols +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.ntheory.generate import prime +from sympy.polys.domains.integerring import ZZ +from sympy.polys.polytools import Poly +from sympy.utilities.iterables import permute_signs +from sympy.testing.pytest import raises + +from sympy.polys.specialpolys import ( + swinnerton_dyer_poly, + cyclotomic_poly, + symmetric_poly, + random_poly, + interpolating_poly, + fateman_poly_F_1, + dmp_fateman_poly_F_1, + fateman_poly_F_2, + dmp_fateman_poly_F_2, + fateman_poly_F_3, + dmp_fateman_poly_F_3, +) + +from sympy.abc import x, y, z + + +def test_swinnerton_dyer_poly(): + raises(ValueError, lambda: swinnerton_dyer_poly(0, x)) + + assert swinnerton_dyer_poly(1, x, polys=True) == Poly(x**2 - 2) + + assert swinnerton_dyer_poly(1, x) == x**2 - 2 + assert swinnerton_dyer_poly(2, x) == x**4 - 10*x**2 + 1 + assert swinnerton_dyer_poly( + 3, x) == x**8 - 40*x**6 + 352*x**4 - 960*x**2 + 576 + # we only need to check that the polys arg works but + # we may as well test that the roots are correct + p = [sqrt(prime(i)) for i in range(1, 5)] + assert str([i.n(3) for i in + swinnerton_dyer_poly(4, polys=True).all_roots()] + ) == str(sorted([Add(*i).n(3) for i in permute_signs(p)])) + + +def test_cyclotomic_poly(): + raises(ValueError, lambda: cyclotomic_poly(0, x)) + + assert cyclotomic_poly(1, x, polys=True) == Poly(x - 1) + + assert cyclotomic_poly(1, x) == x - 1 + assert cyclotomic_poly(2, x) == x + 1 + assert cyclotomic_poly(3, x) == x**2 + x + 1 + assert cyclotomic_poly(4, x) == x**2 + 1 + assert cyclotomic_poly(5, x) == x**4 + x**3 + x**2 + x + 1 + assert cyclotomic_poly(6, x) == x**2 - x + 1 + + +def test_symmetric_poly(): + raises(ValueError, lambda: symmetric_poly(-1, x, y, z)) + raises(ValueError, lambda: symmetric_poly(5, x, y, z)) + + assert symmetric_poly(1, x, y, z, polys=True) == Poly(x + y + z) + assert symmetric_poly(1, (x, y, z), polys=True) == Poly(x + y + z) + + assert symmetric_poly(0, x, y, z) == 1 + assert symmetric_poly(1, x, y, z) == x + y + z + assert symmetric_poly(2, x, y, z) == x*y + x*z + y*z + assert symmetric_poly(3, x, y, z) == x*y*z + + +def test_random_poly(): + poly = random_poly(x, 10, -100, 100, polys=False) + + assert Poly(poly).degree() == 10 + assert all(-100 <= coeff <= 100 for coeff in Poly(poly).coeffs()) is True + + poly = random_poly(x, 10, -100, 100, polys=True) + + assert poly.degree() == 10 + assert all(-100 <= coeff <= 100 for coeff in poly.coeffs()) is True + + +def test_interpolating_poly(): + x0, x1, x2, x3, y0, y1, y2, y3 = symbols('x:4, y:4') + + assert interpolating_poly(0, x) == 0 + assert interpolating_poly(1, x) == y0 + + assert interpolating_poly(2, x) == \ + y0*(x - x1)/(x0 - x1) + y1*(x - x0)/(x1 - x0) + + assert interpolating_poly(3, x) == \ + y0*(x - x1)*(x - x2)/((x0 - x1)*(x0 - x2)) + \ + y1*(x - x0)*(x - x2)/((x1 - x0)*(x1 - x2)) + \ + y2*(x - x0)*(x - x1)/((x2 - x0)*(x2 - x1)) + + assert interpolating_poly(4, x) == \ + y0*(x - x1)*(x - x2)*(x - x3)/((x0 - x1)*(x0 - x2)*(x0 - x3)) + \ + y1*(x - x0)*(x - x2)*(x - x3)/((x1 - x0)*(x1 - x2)*(x1 - x3)) + \ + y2*(x - x0)*(x - x1)*(x - x3)/((x2 - x0)*(x2 - x1)*(x2 - x3)) + \ + y3*(x - x0)*(x - x1)*(x - x2)/((x3 - x0)*(x3 - x1)*(x3 - x2)) + + raises(ValueError, lambda: + interpolating_poly(2, x, (x, 2), (1, 3))) + raises(ValueError, lambda: + interpolating_poly(2, x, (x + y, 2), (1, 3))) + raises(ValueError, lambda: + interpolating_poly(2, x + y, (x, 2), (1, 3))) + raises(ValueError, lambda: + interpolating_poly(2, 3, (4, 5), (6, 7))) + raises(ValueError, lambda: + interpolating_poly(2, 3, (4, 5), (6, 7, 8))) + assert interpolating_poly(0, x, (1, 2), (3, 4)) == 0 + assert interpolating_poly(1, x, (1, 2), (3, 4)) == 3 + assert interpolating_poly(2, x, (1, 2), (3, 4)) == x + 2 + + +def test_fateman_poly_F_1(): + f, g, h = fateman_poly_F_1(1) + F, G, H = dmp_fateman_poly_F_1(1, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] + + f, g, h = fateman_poly_F_1(3) + F, G, H = dmp_fateman_poly_F_1(3, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] + + +def test_fateman_poly_F_2(): + f, g, h = fateman_poly_F_2(1) + F, G, H = dmp_fateman_poly_F_2(1, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] + + f, g, h = fateman_poly_F_2(3) + F, G, H = dmp_fateman_poly_F_2(3, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] + + +def test_fateman_poly_F_3(): + f, g, h = fateman_poly_F_3(1) + F, G, H = dmp_fateman_poly_F_3(1, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] + + f, g, h = fateman_poly_F_3(3) + F, G, H = dmp_fateman_poly_F_3(3, ZZ) + + assert [ t.rep.to_list() for t in [f, g, h] ] == [F, G, H] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_sqfreetools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_sqfreetools.py new file mode 100644 index 0000000000000000000000000000000000000000..b772a05a50e2eacd5a7c80352b1eadd52c69c3fa --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_sqfreetools.py @@ -0,0 +1,160 @@ +"""Tests for square-free decomposition algorithms and related tools. """ + +from sympy.polys.rings import ring +from sympy.polys.domains import FF, ZZ, QQ +from sympy.polys.specialpolys import f_polys + +from sympy.testing.pytest import raises +from sympy.external.gmpy import MPQ + +f_0, f_1, f_2, f_3, f_4, f_5, f_6 = f_polys() + +def test_dup_sqf(): + R, x = ring("x", ZZ) + + assert R.dup_sqf_part(0) == 0 + assert R.dup_sqf_p(0) is True + + assert R.dup_sqf_part(7) == 1 + assert R.dup_sqf_p(7) is True + + assert R.dup_sqf_part(2*x + 2) == x + 1 + assert R.dup_sqf_p(2*x + 2) is True + + assert R.dup_sqf_part(x**3 + x + 1) == x**3 + x + 1 + assert R.dup_sqf_p(x**3 + x + 1) is True + + assert R.dup_sqf_part(-x**3 + x + 1) == x**3 - x - 1 + assert R.dup_sqf_p(-x**3 + x + 1) is True + + assert R.dup_sqf_part(2*x**3 + 3*x**2) == 2*x**2 + 3*x + assert R.dup_sqf_p(2*x**3 + 3*x**2) is False + + assert R.dup_sqf_part(-2*x**3 + 3*x**2) == 2*x**2 - 3*x + assert R.dup_sqf_p(-2*x**3 + 3*x**2) is False + + assert R.dup_sqf_list(0) == (0, []) + assert R.dup_sqf_list(1) == (1, []) + + assert R.dup_sqf_list(x) == (1, [(x, 1)]) + assert R.dup_sqf_list(2*x**2) == (2, [(x, 2)]) + assert R.dup_sqf_list(3*x**3) == (3, [(x, 3)]) + + assert R.dup_sqf_list(-x**5 + x**4 + x - 1) == \ + (-1, [(x**3 + x**2 + x + 1, 1), (x - 1, 2)]) + assert R.dup_sqf_list(x**8 + 6*x**6 + 12*x**4 + 8*x**2) == \ + ( 1, [(x, 2), (x**2 + 2, 3)]) + + assert R.dup_sqf_list(2*x**2 + 4*x + 2) == (2, [(x + 1, 2)]) + + R, x = ring("x", QQ) + assert R.dup_sqf_list(2*x**2 + 4*x + 2) == (2, [(x + 1, 2)]) + + R, x = ring("x", FF(2)) + assert R.dup_sqf_list(x**2 + 1) == (1, [(x + 1, 2)]) + + R, x = ring("x", FF(3)) + assert R.dup_sqf_list(x**10 + 2*x**7 + 2*x**4 + x) == \ + (1, [(x, 1), + (x + 1, 3), + (x + 2, 6)]) + + R1, x = ring("x", ZZ) + R2, y = ring("y", FF(3)) + + f = x**3 + 1 + g = y**3 + 1 + + assert R1.dup_sqf_part(f) == f + assert R2.dup_sqf_part(g) == y + 1 + + assert R1.dup_sqf_p(f) is True + assert R2.dup_sqf_p(g) is False + + R, x, y = ring("x,y", ZZ) + + A = x**4 - 3*x**2 + 6 + D = x**6 - 5*x**4 + 5*x**2 + 4 + + f, g = D, R.dmp_sub(A, R.dmp_mul(R.dmp_diff(D, 1), y)) + res = R.dmp_resultant(f, g) + h = (4*y**2 + 1).drop(x) + + assert R.drop(x).dup_sqf_list(res) == (45796, [(h, 3)]) + + Rt, t = ring("t", ZZ) + R, x = ring("x", Rt) + assert R.dup_sqf_list_include(t**3*x**2) == [(t**3, 1), (x, 2)] + + +def test_dmp_sqf(): + R, x, y = ring("x,y", ZZ) + assert R.dmp_sqf_part(0) == 0 + assert R.dmp_sqf_p(0) is True + + assert R.dmp_sqf_part(7) == 1 + assert R.dmp_sqf_p(7) is True + + assert R.dmp_sqf_list(3) == (3, []) + assert R.dmp_sqf_list_include(3) == [(3, 1)] + + R, x, y, z = ring("x,y,z", ZZ) + assert R.dmp_sqf_p(f_0) is True + assert R.dmp_sqf_p(f_0**2) is False + assert R.dmp_sqf_p(f_1) is True + assert R.dmp_sqf_p(f_1**2) is False + assert R.dmp_sqf_p(f_2) is True + assert R.dmp_sqf_p(f_2**2) is False + assert R.dmp_sqf_p(f_3) is True + assert R.dmp_sqf_p(f_3**2) is False + assert R.dmp_sqf_p(f_5) is False + assert R.dmp_sqf_p(f_5**2) is False + + assert R.dmp_sqf_p(f_4) is True + assert R.dmp_sqf_part(f_4) == -f_4 + + assert R.dmp_sqf_part(f_5) == x + y - z + + R, x, y, z, t = ring("x,y,z,t", ZZ) + assert R.dmp_sqf_p(f_6) is True + assert R.dmp_sqf_part(f_6) == f_6 + + R, x = ring("x", ZZ) + f = -x**5 + x**4 + x - 1 + + assert R.dmp_sqf_list(f) == (-1, [(x**3 + x**2 + x + 1, 1), (x - 1, 2)]) + assert R.dmp_sqf_list_include(f) == [(-x**3 - x**2 - x - 1, 1), (x - 1, 2)] + + R, x, y = ring("x,y", ZZ) + f = -x**5 + x**4 + x - 1 + + assert R.dmp_sqf_list(f) == (-1, [(x**3 + x**2 + x + 1, 1), (x - 1, 2)]) + assert R.dmp_sqf_list_include(f) == [(-x**3 - x**2 - x - 1, 1), (x - 1, 2)] + + f = -x**2 + 2*x - 1 + assert R.dmp_sqf_list_include(f) == [(-1, 1), (x - 1, 2)] + + f = (y**2 + 1)**2*(x**2 + 2*x + 2) + assert R.dmp_sqf_p(f) is False + assert R.dmp_sqf_list(f) == (1, [(x**2 + 2*x + 2, 1), (y**2 + 1, 2)]) + + R, x, y = ring("x,y", FF(2)) + raises(NotImplementedError, lambda: R.dmp_sqf_list(y**2 + 1)) + + +def test_dup_gff_list(): + R, x = ring("x", ZZ) + + f = x**5 + 2*x**4 - x**3 - 2*x**2 + assert R.dup_gff_list(f) == [(x, 1), (x + 2, 4)] + + g = x**9 - 20*x**8 + 166*x**7 - 744*x**6 + 1965*x**5 - 3132*x**4 + 2948*x**3 - 1504*x**2 + 320*x + assert R.dup_gff_list(g) == [(x**2 - 5*x + 4, 1), (x**2 - 5*x + 4, 2), (x, 3)] + + raises(ValueError, lambda: R.dup_gff_list(0)) + +def test_issue_26178(): + R, x, y, z = ring(['x', 'y', 'z'], QQ) + assert (x**2 - 2*y**2 + 1).sqf_list() == (MPQ(1,1), [(x**2 - 2*y**2 + 1, 1)]) + assert (x**2 - 2*z**2 + 1).sqf_list() == (MPQ(1,1), [(x**2 - 2*z**2 + 1, 1)]) + assert (y**2 - 2*z**2 + 1).sqf_list() == (MPQ(1,1), [(y**2 - 2*z**2 + 1, 1)]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_subresultants_qq_zz.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_subresultants_qq_zz.py new file mode 100644 index 0000000000000000000000000000000000000000..7f7560dfeaf93b20f7cf68cdc597c024cb519cca --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/polys/tests/test_subresultants_qq_zz.py @@ -0,0 +1,347 @@ +from sympy.core.symbol import Symbol +from sympy.polys.polytools import (pquo, prem, sturm, subresultants) +from sympy.matrices import Matrix +from sympy.polys.subresultants_qq_zz import (sylvester, res, res_q, res_z, bezout, + subresultants_sylv, modified_subresultants_sylv, + subresultants_bezout, modified_subresultants_bezout, + backward_eye, + sturm_pg, sturm_q, sturm_amv, euclid_pg, euclid_q, + euclid_amv, modified_subresultants_pg, subresultants_pg, + subresultants_amv_q, quo_z, rem_z, subresultants_amv, + modified_subresultants_amv, subresultants_rem, + subresultants_vv, subresultants_vv_2) + + +def test_sylvester(): + x = Symbol('x') + + assert sylvester(x**3 -7, 0, x) == sylvester(x**3 -7, 0, x, 1) == Matrix([[0]]) + assert sylvester(0, x**3 -7, x) == sylvester(0, x**3 -7, x, 1) == Matrix([[0]]) + assert sylvester(x**3 -7, 0, x, 2) == Matrix([[0]]) + assert sylvester(0, x**3 -7, x, 2) == Matrix([[0]]) + + assert sylvester(x**3 -7, 7, x).det() == sylvester(x**3 -7, 7, x, 1).det() == 343 + assert sylvester(7, x**3 -7, x).det() == sylvester(7, x**3 -7, x, 1).det() == 343 + assert sylvester(x**3 -7, 7, x, 2).det() == -343 + assert sylvester(7, x**3 -7, x, 2).det() == 343 + + assert sylvester(3, 7, x).det() == sylvester(3, 7, x, 1).det() == sylvester(3, 7, x, 2).det() == 1 + + assert sylvester(3, 0, x).det() == sylvester(3, 0, x, 1).det() == sylvester(3, 0, x, 2).det() == 1 + + assert sylvester(x - 3, x - 8, x) == sylvester(x - 3, x - 8, x, 1) == sylvester(x - 3, x - 8, x, 2) == Matrix([[1, -3], [1, -8]]) + + assert sylvester(x**3 - 7*x + 7, 3*x**2 - 7, x) == sylvester(x**3 - 7*x + 7, 3*x**2 - 7, x, 1) == Matrix([[1, 0, -7, 7, 0], [0, 1, 0, -7, 7], [3, 0, -7, 0, 0], [0, 3, 0, -7, 0], [0, 0, 3, 0, -7]]) + + assert sylvester(x**3 - 7*x + 7, 3*x**2 - 7, x, 2) == Matrix([ +[1, 0, -7, 7, 0, 0], [0, 3, 0, -7, 0, 0], [0, 1, 0, -7, 7, 0], [0, 0, 3, 0, -7, 0], [0, 0, 1, 0, -7, 7], [0, 0, 0, 3, 0, -7]]) + +def test_subresultants_sylv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_sylv(p, q, x) == subresultants(p, q, x) + assert subresultants_sylv(p, q, x)[-1] == res(p, q, x) + assert subresultants_sylv(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_sylv(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_sylv(p, q, x) == euclid_amv(p, q, x) + +def test_modified_subresultants_sylv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + amv_factors = [1, 1, -1, 1, -1, 1] + assert modified_subresultants_sylv(p, q, x) == [i*j for i, j in zip(amv_factors, subresultants_amv(p, q, x))] + assert modified_subresultants_sylv(p, q, x)[-1] != res_q(p + x**8, q, x) + assert modified_subresultants_sylv(p, q, x) != sturm_amv(p, q, x) + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert modified_subresultants_sylv(p, q, x) == sturm_amv(p, q, x) + assert modified_subresultants_sylv(-p, q, x) != sturm_amv(-p, q, x) + +def test_res(): + x = Symbol('x') + + assert res(3, 5, x) == 1 + +def test_res_q(): + x = Symbol('x') + + assert res_q(3, 5, x) == 1 + +def test_res_z(): + x = Symbol('x') + + assert res_z(3, 5, x) == 1 + assert res(3, 5, x) == res_q(3, 5, x) == res_z(3, 5, x) + +def test_bezout(): + x = Symbol('x') + + p = -2*x**5+7*x**3+9*x**2-3*x+1 + q = -10*x**4+21*x**2+18*x-3 + assert bezout(p, q, x, 'bz').det() == sylvester(p, q, x, 2).det() + assert bezout(p, q, x, 'bz').det() != sylvester(p, q, x, 1).det() + assert bezout(p, q, x, 'prs') == backward_eye(5) * bezout(p, q, x, 'bz') * backward_eye(5) + +def test_subresultants_bezout(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_bezout(p, q, x) == subresultants(p, q, x) + assert subresultants_bezout(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_bezout(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_bezout(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_bezout(p, q, x) == euclid_amv(p, q, x) + +def test_modified_subresultants_bezout(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + amv_factors = [1, 1, -1, 1, -1, 1] + assert modified_subresultants_bezout(p, q, x) == [i*j for i, j in zip(amv_factors, subresultants_amv(p, q, x))] + assert modified_subresultants_bezout(p, q, x)[-1] != sylvester(p + x**8, q, x).det() + assert modified_subresultants_bezout(p, q, x) != sturm_amv(p, q, x) + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert modified_subresultants_bezout(p, q, x) == sturm_amv(p, q, x) + assert modified_subresultants_bezout(-p, q, x) != sturm_amv(-p, q, x) + +def test_sturm_pg(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert sturm_pg(p, q, x)[-1] != sylvester(p, q, x, 2).det() + sam_factors = [1, 1, -1, -1, 1, 1] + assert sturm_pg(p, q, x) == [i*j for i,j in zip(sam_factors, euclid_pg(p, q, x))] + + p = -9*x**5 - 5*x**3 - 9 + q = -45*x**4 - 15*x**2 + assert sturm_pg(p, q, x, 1)[-1] == sylvester(p, q, x, 1).det() + assert sturm_pg(p, q, x)[-1] != sylvester(p, q, x, 2).det() + assert sturm_pg(-p, q, x)[-1] == sylvester(-p, q, x, 2).det() + assert sturm_pg(-p, q, x) == modified_subresultants_pg(-p, q, x) + +def test_sturm_q(): + x = Symbol('x') + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert sturm_q(p, q, x) == sturm(p) + assert sturm_q(-p, -q, x) != sturm(-p) + + +def test_sturm_amv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert sturm_amv(p, q, x)[-1] != sylvester(p, q, x, 2).det() + sam_factors = [1, 1, -1, -1, 1, 1] + assert sturm_amv(p, q, x) == [i*j for i,j in zip(sam_factors, euclid_amv(p, q, x))] + + p = -9*x**5 - 5*x**3 - 9 + q = -45*x**4 - 15*x**2 + assert sturm_amv(p, q, x, 1)[-1] == sylvester(p, q, x, 1).det() + assert sturm_amv(p, q, x)[-1] != sylvester(p, q, x, 2).det() + assert sturm_amv(-p, q, x)[-1] == sylvester(-p, q, x, 2).det() + assert sturm_pg(-p, q, x) == modified_subresultants_pg(-p, q, x) + + +def test_euclid_pg(): + x = Symbol('x') + + p = x**6+x**5-x**4-x**3+x**2-x+1 + q = 6*x**5+5*x**4-4*x**3-3*x**2+2*x-1 + assert euclid_pg(p, q, x)[-1] == sylvester(p, q, x).det() + assert euclid_pg(p, q, x) == subresultants_pg(p, q, x) + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert euclid_pg(p, q, x)[-1] != sylvester(p, q, x, 2).det() + sam_factors = [1, 1, -1, -1, 1, 1] + assert euclid_pg(p, q, x) == [i*j for i,j in zip(sam_factors, sturm_pg(p, q, x))] + + +def test_euclid_q(): + x = Symbol('x') + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert euclid_q(p, q, x)[-1] == -sturm(p)[-1] + + +def test_euclid_amv(): + x = Symbol('x') + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert euclid_amv(p, q, x)[-1] == sylvester(p, q, x).det() + assert euclid_amv(p, q, x) == subresultants_amv(p, q, x) + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert euclid_amv(p, q, x)[-1] != sylvester(p, q, x, 2).det() + sam_factors = [1, 1, -1, -1, 1, 1] + assert euclid_amv(p, q, x) == [i*j for i,j in zip(sam_factors, sturm_amv(p, q, x))] + + +def test_modified_subresultants_pg(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + amv_factors = [1, 1, -1, 1, -1, 1] + assert modified_subresultants_pg(p, q, x) == [i*j for i, j in zip(amv_factors, subresultants_pg(p, q, x))] + assert modified_subresultants_pg(p, q, x)[-1] != sylvester(p + x**8, q, x).det() + assert modified_subresultants_pg(p, q, x) != sturm_pg(p, q, x) + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert modified_subresultants_pg(p, q, x) == sturm_pg(p, q, x) + assert modified_subresultants_pg(-p, q, x) != sturm_pg(-p, q, x) + + +def test_subresultants_pg(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_pg(p, q, x) == subresultants(p, q, x) + assert subresultants_pg(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_pg(p, q, x) != euclid_pg(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_pg(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_pg(p, q, x) == euclid_pg(p, q, x) + + +def test_subresultants_amv_q(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_amv_q(p, q, x) == subresultants(p, q, x) + assert subresultants_amv_q(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_amv_q(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_amv_q(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_amv(p, q, x) == euclid_amv(p, q, x) + + +def test_rem_z(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert rem_z(p, -q, x) != prem(p, -q, x) + +def test_quo_z(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert quo_z(p, -q, x) != pquo(p, -q, x) + + y = Symbol('y') + q = 3*x**6 + 5*y**4 - 4*x**2 - 9*x + 21 + assert quo_z(p, -q, x) == pquo(p, -q, x) + +def test_subresultants_amv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_amv(p, q, x) == subresultants(p, q, x) + assert subresultants_amv(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_amv(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_amv(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_amv(p, q, x) == euclid_amv(p, q, x) + + +def test_modified_subresultants_amv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + amv_factors = [1, 1, -1, 1, -1, 1] + assert modified_subresultants_amv(p, q, x) == [i*j for i, j in zip(amv_factors, subresultants_amv(p, q, x))] + assert modified_subresultants_amv(p, q, x)[-1] != sylvester(p + x**8, q, x).det() + assert modified_subresultants_amv(p, q, x) != sturm_amv(p, q, x) + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert modified_subresultants_amv(p, q, x) == sturm_amv(p, q, x) + assert modified_subresultants_amv(-p, q, x) != sturm_amv(-p, q, x) + + +def test_subresultants_rem(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_rem(p, q, x) == subresultants(p, q, x) + assert subresultants_rem(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_rem(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_rem(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_rem(p, q, x) == euclid_amv(p, q, x) + + +def test_subresultants_vv(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_vv(p, q, x) == subresultants(p, q, x) + assert subresultants_vv(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_vv(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_vv(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_vv(p, q, x) == euclid_amv(p, q, x) + + +def test_subresultants_vv_2(): + x = Symbol('x') + + p = x**8 + x**6 - 3*x**4 - 3*x**3 + 8*x**2 + 2*x - 5 + q = 3*x**6 + 5*x**4 - 4*x**2 - 9*x + 21 + assert subresultants_vv_2(p, q, x) == subresultants(p, q, x) + assert subresultants_vv_2(p, q, x)[-1] == sylvester(p, q, x).det() + assert subresultants_vv_2(p, q, x) != euclid_amv(p, q, x) + amv_factors = [1, 1, -1, 1, -1, 1] + assert subresultants_vv_2(p, q, x) == [i*j for i, j in zip(amv_factors, modified_subresultants_amv(p, q, x))] + + p = x**3 - 7*x + 7 + q = 3*x**2 - 7 + assert subresultants_vv_2(p, q, x) == euclid_amv(p, q, x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..15dfaf70eb3777195b7c9a0930894bb2187bbb50 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/__init__.py @@ -0,0 +1,111 @@ +"""Printing subsystem""" + +from .pretty import pager_print, pretty, pretty_print, pprint, pprint_use_unicode, pprint_try_use_unicode + +from .latex import latex, print_latex, multiline_latex + +from .mathml import mathml, print_mathml + +from .python import python, print_python + +from .pycode import pycode + +from .codeprinter import print_ccode, print_fcode + +from .codeprinter import ccode, fcode, cxxcode, rust_code # noqa:F811 + +from .smtlib import smtlib_code + +from .glsl import glsl_code, print_glsl + +from .rcode import rcode, print_rcode + +from .jscode import jscode, print_jscode + +from .julia import julia_code + +from .mathematica import mathematica_code + +from .octave import octave_code + +from .gtk import print_gtk + +from .preview import preview + +from .repr import srepr + +from .tree import print_tree + +from .str import StrPrinter, sstr, sstrrepr + +from .tableform import TableForm + +from .dot import dotprint + +from .maple import maple_code, print_maple_code + +__all__ = [ + # sympy.printing.pretty + 'pager_print', 'pretty', 'pretty_print', 'pprint', 'pprint_use_unicode', + 'pprint_try_use_unicode', + + # sympy.printing.latex + 'latex', 'print_latex', 'multiline_latex', + + # sympy.printing.mathml + 'mathml', 'print_mathml', + + # sympy.printing.python + 'python', 'print_python', + + # sympy.printing.pycode + 'pycode', + + # sympy.printing.codeprinter + 'ccode', 'print_ccode', 'cxxcode', 'fcode', 'print_fcode', 'rust_code', + + # sympy.printing.smtlib + 'smtlib_code', + + # sympy.printing.glsl + 'glsl_code', 'print_glsl', + + # sympy.printing.rcode + 'rcode', 'print_rcode', + + # sympy.printing.jscode + 'jscode', 'print_jscode', + + # sympy.printing.julia + 'julia_code', + + # sympy.printing.mathematica + 'mathematica_code', + + # sympy.printing.octave + 'octave_code', + + # sympy.printing.gtk + 'print_gtk', + + # sympy.printing.preview + 'preview', + + # sympy.printing.repr + 'srepr', + + # sympy.printing.tree + 'print_tree', + + # sympy.printing.str + 'StrPrinter', 'sstr', 'sstrrepr', + + # sympy.printing.tableform + 'TableForm', + + # sympy.printing.dot + 'dotprint', + + # sympy.printing.maple + 'maple_code', 'print_maple_code', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/__pycache__/__init__.cpython-310.pyc new file 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0000000000000000000000000000000000000000..1e31c6940a86bd25ef8805420b84c22c5e08bca9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/aesaracode.py @@ -0,0 +1,563 @@ +from __future__ import annotations +import math +from typing import Any + +from sympy.external import import_module +from sympy.printing.printer import Printer +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import is_sequence +import sympy +from functools import partial + + +aesara = import_module('aesara') + +if aesara: + aes = aesara.scalar + aet = aesara.tensor + from aesara.tensor import nlinalg + from aesara.tensor.elemwise import Elemwise + from aesara.tensor.elemwise import DimShuffle + + # `true_divide` replaced `true_div` in Aesara 2.8.11 (released 2023) to + # match NumPy + # XXX: Remove this when not needed to support older versions. + true_divide = getattr(aet, 'true_divide', None) + if true_divide is None: + true_divide = aet.true_div + + mapping = { + sympy.Add: aet.add, + sympy.Mul: aet.mul, + sympy.Abs: aet.abs, + sympy.sign: aet.sgn, + sympy.ceiling: aet.ceil, + sympy.floor: aet.floor, + sympy.log: aet.log, + sympy.exp: aet.exp, + sympy.sqrt: aet.sqrt, + sympy.cos: aet.cos, + sympy.acos: aet.arccos, + sympy.sin: aet.sin, + sympy.asin: aet.arcsin, + sympy.tan: aet.tan, + sympy.atan: aet.arctan, + sympy.atan2: aet.arctan2, + sympy.cosh: aet.cosh, + sympy.acosh: aet.arccosh, + sympy.sinh: aet.sinh, + sympy.asinh: aet.arcsinh, + sympy.tanh: aet.tanh, + sympy.atanh: aet.arctanh, + sympy.re: aet.real, + sympy.im: aet.imag, + sympy.arg: aet.angle, + sympy.erf: aet.erf, + sympy.gamma: aet.gamma, + sympy.loggamma: aet.gammaln, + sympy.Pow: aet.pow, + sympy.Eq: aet.eq, + sympy.StrictGreaterThan: aet.gt, + sympy.StrictLessThan: aet.lt, + sympy.LessThan: aet.le, + sympy.GreaterThan: aet.ge, + sympy.And: aet.bitwise_and, # bitwise + sympy.Or: aet.bitwise_or, # bitwise + sympy.Not: aet.invert, # bitwise + sympy.Xor: aet.bitwise_xor, # bitwise + sympy.Max: aet.maximum, # Sympy accept >2 inputs, Aesara only 2 + sympy.Min: aet.minimum, # Sympy accept >2 inputs, Aesara only 2 + sympy.conjugate: aet.conj, + sympy.core.numbers.ImaginaryUnit: lambda:aet.complex(0,1), + # Matrices + sympy.MatAdd: Elemwise(aes.add), + sympy.HadamardProduct: Elemwise(aes.mul), + sympy.Trace: nlinalg.trace, + sympy.Determinant : nlinalg.det, + sympy.Inverse: nlinalg.matrix_inverse, + sympy.Transpose: DimShuffle((False, False), [1, 0]), + } + + +class AesaraPrinter(Printer): + """ + .. deprecated:: 1.14. + The ``Aesara Code printing`` is deprecated.See its documentation for + more information. See :ref:`deprecated-aesaraprinter` for details. + + Code printer which creates Aesara symbolic expression graphs. + + Parameters + ========== + + cache : dict + Cache dictionary to use. If None (default) will use + the global cache. To create a printer which does not depend on or alter + global state pass an empty dictionary. Note: the dictionary is not + copied on initialization of the printer and will be updated in-place, + so using the same dict object when creating multiple printers or making + multiple calls to :func:`.aesara_code` or :func:`.aesara_function` means + the cache is shared between all these applications. + + Attributes + ========== + + cache : dict + A cache of Aesara variables which have been created for SymPy + symbol-like objects (e.g. :class:`sympy.core.symbol.Symbol` or + :class:`sympy.matrices.expressions.MatrixSymbol`). This is used to + ensure that all references to a given symbol in an expression (or + multiple expressions) are printed as the same Aesara variable, which is + created only once. Symbols are differentiated only by name and type. The + format of the cache's contents should be considered opaque to the user. + """ + printmethod = "_aesara" + + def __init__(self, *args, **kwargs): + self.cache = kwargs.pop('cache', {}) + super().__init__(*args, **kwargs) + + def _get_key(self, s, name=None, dtype=None, broadcastable=None): + """ Get the cache key for a SymPy object. + + Parameters + ========== + + s : sympy.core.basic.Basic + SymPy object to get key for. + + name : str + Name of object, if it does not have a ``name`` attribute. + """ + + if name is None: + name = s.name + + return (name, type(s), s.args, dtype, broadcastable) + + def _get_or_create(self, s, name=None, dtype=None, broadcastable=None): + """ + Get the Aesara variable for a SymPy symbol from the cache, or create it + if it does not exist. + """ + + # Defaults + if name is None: + name = s.name + if dtype is None: + dtype = 'floatX' + if broadcastable is None: + broadcastable = () + + key = self._get_key(s, name, dtype=dtype, broadcastable=broadcastable) + + if key in self.cache: + return self.cache[key] + + value = aet.tensor(name=name, dtype=dtype, shape=broadcastable) + self.cache[key] = value + return value + + def _print_Symbol(self, s, **kwargs): + dtype = kwargs.get('dtypes', {}).get(s) + bc = kwargs.get('broadcastables', {}).get(s) + return self._get_or_create(s, dtype=dtype, broadcastable=bc) + + def _print_AppliedUndef(self, s, **kwargs): + name = str(type(s)) + '_' + str(s.args[0]) + dtype = kwargs.get('dtypes', {}).get(s) + bc = kwargs.get('broadcastables', {}).get(s) + return self._get_or_create(s, name=name, dtype=dtype, broadcastable=bc) + + def _print_Basic(self, expr, **kwargs): + op = mapping[type(expr)] + children = [self._print(arg, **kwargs) for arg in expr.args] + return op(*children) + + def _print_Number(self, n, **kwargs): + # Integers already taken care of below, interpret as float + return float(n.evalf()) + + def _print_MatrixSymbol(self, X, **kwargs): + dtype = kwargs.get('dtypes', {}).get(X) + return self._get_or_create(X, dtype=dtype, broadcastable=(None, None)) + + def _print_DenseMatrix(self, X, **kwargs): + if not hasattr(aet, 'stacklists'): + raise NotImplementedError( + "Matrix translation not yet supported in this version of Aesara") + + return aet.stacklists([ + [self._print(arg, **kwargs) for arg in L] + for L in X.tolist() + ]) + + _print_ImmutableMatrix = _print_ImmutableDenseMatrix = _print_DenseMatrix + + def _print_MatMul(self, expr, **kwargs): + children = [self._print(arg, **kwargs) for arg in expr.args] + result = children[0] + for child in children[1:]: + result = aet.dot(result, child) + return result + + def _print_MatPow(self, expr, **kwargs): + children = [self._print(arg, **kwargs) for arg in expr.args] + result = 1 + if isinstance(children[1], int) and children[1] > 0: + for i in range(children[1]): + result = aet.dot(result, children[0]) + else: + raise NotImplementedError('''Only non-negative integer + powers of matrices can be handled by Aesara at the moment''') + return result + + def _print_MatrixSlice(self, expr, **kwargs): + parent = self._print(expr.parent, **kwargs) + rowslice = self._print(slice(*expr.rowslice), **kwargs) + colslice = self._print(slice(*expr.colslice), **kwargs) + return parent[rowslice, colslice] + + def _print_BlockMatrix(self, expr, **kwargs): + nrows, ncols = expr.blocks.shape + blocks = [[self._print(expr.blocks[r, c], **kwargs) + for c in range(ncols)] + for r in range(nrows)] + return aet.join(0, *[aet.join(1, *row) for row in blocks]) + + + def _print_slice(self, expr, **kwargs): + return slice(*[self._print(i, **kwargs) + if isinstance(i, sympy.Basic) else i + for i in (expr.start, expr.stop, expr.step)]) + + def _print_Pi(self, expr, **kwargs): + return math.pi + + def _print_Piecewise(self, expr, **kwargs): + import numpy as np + e, cond = expr.args[0].args # First condition and corresponding value + + # Print conditional expression and value for first condition + p_cond = self._print(cond, **kwargs) + p_e = self._print(e, **kwargs) + + # One condition only + if len(expr.args) == 1: + # Return value if condition else NaN + return aet.switch(p_cond, p_e, np.nan) + + # Return value_1 if condition_1 else evaluate remaining conditions + p_remaining = self._print(sympy.Piecewise(*expr.args[1:]), **kwargs) + return aet.switch(p_cond, p_e, p_remaining) + + def _print_Rational(self, expr, **kwargs): + return true_divide(self._print(expr.p, **kwargs), + self._print(expr.q, **kwargs)) + + def _print_Integer(self, expr, **kwargs): + return expr.p + + def _print_factorial(self, expr, **kwargs): + return self._print(sympy.gamma(expr.args[0] + 1), **kwargs) + + def _print_Derivative(self, deriv, **kwargs): + from aesara.gradient import Rop + + rv = self._print(deriv.expr, **kwargs) + for var in deriv.variables: + var = self._print(var, **kwargs) + rv = Rop(rv, var, aet.ones_like(var)) + return rv + + def emptyPrinter(self, expr): + return expr + + def doprint(self, expr, dtypes=None, broadcastables=None): + """ Convert a SymPy expression to a Aesara graph variable. + + The ``dtypes`` and ``broadcastables`` arguments are used to specify the + data type, dimension, and broadcasting behavior of the Aesara variables + corresponding to the free symbols in ``expr``. Each is a mapping from + SymPy symbols to the value of the corresponding argument to + ``aesara.tensor.var.TensorVariable``. + + See the corresponding `documentation page`__ for more information on + broadcasting in Aesara. + + + .. __: https://aesara.readthedocs.io/en/latest/reference/tensor/shapes.html#broadcasting + + Parameters + ========== + + expr : sympy.core.expr.Expr + SymPy expression to print. + + dtypes : dict + Mapping from SymPy symbols to Aesara datatypes to use when creating + new Aesara variables for those symbols. Corresponds to the ``dtype`` + argument to ``aesara.tensor.var.TensorVariable``. Defaults to ``'floatX'`` + for symbols not included in the mapping. + + broadcastables : dict + Mapping from SymPy symbols to the value of the ``broadcastable`` + argument to ``aesara.tensor.var.TensorVariable`` to use when creating Aesara + variables for those symbols. Defaults to the empty tuple for symbols + not included in the mapping (resulting in a scalar). + + Returns + ======= + + aesara.graph.basic.Variable + A variable corresponding to the expression's value in a Aesara + symbolic expression graph. + + """ + if dtypes is None: + dtypes = {} + if broadcastables is None: + broadcastables = {} + + return self._print(expr, dtypes=dtypes, broadcastables=broadcastables) + + +global_cache: dict[Any, Any] = {} + + +def aesara_code(expr, cache=None, **kwargs): + """ + Convert a SymPy expression into a Aesara graph variable. + + Parameters + ========== + + expr : sympy.core.expr.Expr + SymPy expression object to convert. + + cache : dict + Cached Aesara variables (see :class:`AesaraPrinter.cache + `). Defaults to the module-level global cache. + + dtypes : dict + Passed to :meth:`.AesaraPrinter.doprint`. + + broadcastables : dict + Passed to :meth:`.AesaraPrinter.doprint`. + + Returns + ======= + + aesara.graph.basic.Variable + A variable corresponding to the expression's value in a Aesara symbolic + expression graph. + + """ + sympy_deprecation_warning( + """ + The aesara_code function is deprecated. + """, + deprecated_since_version="1.14", + active_deprecations_target='deprecated-aesaraprinter', + ) + + if not aesara: + raise ImportError("aesara is required for aesara_code") + + if cache is None: + cache = global_cache + + return AesaraPrinter(cache=cache, settings={}).doprint(expr, **kwargs) + + +def dim_handling(inputs, dim=None, dims=None, broadcastables=None): + r""" + Get value of ``broadcastables`` argument to :func:`.aesara_code` from + keyword arguments to :func:`.aesara_function`. + + Included for backwards compatibility. + + Parameters + ========== + + inputs + Sequence of input symbols. + + dim : int + Common number of dimensions for all inputs. Overrides other arguments + if given. + + dims : dict + Mapping from input symbols to number of dimensions. Overrides + ``broadcastables`` argument if given. + + broadcastables : dict + Explicit value of ``broadcastables`` argument to + :meth:`.AesaraPrinter.doprint`. If not None function will return this value unchanged. + + Returns + ======= + dict + Dictionary mapping elements of ``inputs`` to their "broadcastable" + values (tuple of ``bool``\ s). + """ + if dim is not None: + return dict.fromkeys(inputs, (False,) * dim) + + if dims is not None: + maxdim = max(dims.values()) + return { + s: (False,) * d + (True,) * (maxdim - d) + for s, d in dims.items() + } + + if broadcastables is not None: + return broadcastables + + return {} + + +def aesara_function(inputs, outputs, scalar=False, *, + dim=None, dims=None, broadcastables=None, **kwargs): + """ + Create a Aesara function from SymPy expressions. + + The inputs and outputs are converted to Aesara variables using + :func:`.aesara_code` and then passed to ``aesara.function``. + + Parameters + ========== + + inputs + Sequence of symbols which constitute the inputs of the function. + + outputs + Sequence of expressions which constitute the outputs(s) of the + function. The free symbols of each expression must be a subset of + ``inputs``. + + scalar : bool + Convert 0-dimensional arrays in output to scalars. This will return a + Python wrapper function around the Aesara function object. + + cache : dict + Cached Aesara variables (see :class:`AesaraPrinter.cache + `). Defaults to the module-level global cache. + + dtypes : dict + Passed to :meth:`.AesaraPrinter.doprint`. + + broadcastables : dict + Passed to :meth:`.AesaraPrinter.doprint`. + + dims : dict + Alternative to ``broadcastables`` argument. Mapping from elements of + ``inputs`` to integers indicating the dimension of their associated + arrays/tensors. Overrides ``broadcastables`` argument if given. + + dim : int + Another alternative to the ``broadcastables`` argument. Common number of + dimensions to use for all arrays/tensors. + ``aesara_function([x, y], [...], dim=2)`` is equivalent to using + ``broadcastables={x: (False, False), y: (False, False)}``. + + Returns + ======= + callable + A callable object which takes values of ``inputs`` as positional + arguments and returns an output array for each of the expressions + in ``outputs``. If ``outputs`` is a single expression the function will + return a Numpy array, if it is a list of multiple expressions the + function will return a list of arrays. See description of the ``squeeze`` + argument above for the behavior when a single output is passed in a list. + The returned object will either be an instance of + ``aesara.compile.function.types.Function`` or a Python wrapper + function around one. In both cases, the returned value will have a + ``aesara_function`` attribute which points to the return value of + ``aesara.function``. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.printing.aesaracode import aesara_function + + A simple function with one input and one output: + + >>> f1 = aesara_function([x], [x**2 - 1], scalar=True) + >>> f1(3) + 8.0 + + A function with multiple inputs and one output: + + >>> f2 = aesara_function([x, y, z], [(x**z + y**z)**(1/z)], scalar=True) + >>> f2(3, 4, 2) + 5.0 + + A function with multiple inputs and multiple outputs: + + >>> f3 = aesara_function([x, y], [x**2 + y**2, x**2 - y**2], scalar=True) + >>> f3(2, 3) + [13.0, -5.0] + + See also + ======== + + dim_handling + + """ + sympy_deprecation_warning( + """ + The aesara_function function is deprecated. + """, + deprecated_since_version="1.14", + active_deprecations_target='deprecated-aesaraprinter', + ) + + if not aesara: + raise ImportError("Aesara is required for aesara_function") + + # Pop off non-aesara keyword args + cache = kwargs.pop('cache', {}) + dtypes = kwargs.pop('dtypes', {}) + + broadcastables = dim_handling( + inputs, dim=dim, dims=dims, broadcastables=broadcastables, + ) + + # Print inputs/outputs + code = partial(aesara_code, cache=cache, dtypes=dtypes, + broadcastables=broadcastables) + tinputs = list(map(code, inputs)) + toutputs = list(map(code, outputs)) + + #fix constant expressions as variables + toutputs = [output if isinstance(output, aesara.graph.basic.Variable) else aet.as_tensor_variable(output) for output in toutputs] + + if len(toutputs) == 1: + toutputs = toutputs[0] + + # Compile aesara func + func = aesara.function(tinputs, toutputs, **kwargs) + + is_0d = [len(o.variable.broadcastable) == 0 for o in func.outputs] + + # No wrapper required + if not scalar or not any(is_0d): + func.aesara_function = func + return func + + # Create wrapper to convert 0-dimensional outputs to scalars + def wrapper(*args): + out = func(*args) + # out can be array(1.0) or [array(1.0), array(2.0)] + + if is_sequence(out): + return [o[()] if is_0d[i] else o for i, o in enumerate(out)] + else: + return out[()] + + wrapper.__wrapped__ = func + wrapper.__doc__ = func.__doc__ + wrapper.aesara_function = func + return wrapper diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/c.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/c.py new file mode 100644 index 0000000000000000000000000000000000000000..34c4b8f021073aeee7672248838557b5fa85fbae --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/c.py @@ -0,0 +1,747 @@ +""" +C code printer + +The C89CodePrinter & C99CodePrinter converts single SymPy expressions into +single C expressions, using the functions defined in math.h where possible. + +A complete code generator, which uses ccode extensively, can be found in +sympy.utilities.codegen. The codegen module can be used to generate complete +source code files that are compilable without further modifications. + + +""" + +from __future__ import annotations +from typing import Any + +from functools import wraps +from itertools import chain + +from sympy.core import S +from sympy.core.numbers import equal_valued, Float +from sympy.codegen.ast import ( + Assignment, Pointer, Variable, Declaration, Type, + real, complex_, integer, bool_, float32, float64, float80, + complex64, complex128, intc, value_const, pointer_const, + int8, int16, int32, int64, uint8, uint16, uint32, uint64, untyped, + none +) +from sympy.printing.codeprinter import CodePrinter, requires +from sympy.printing.precedence import precedence, PRECEDENCE +from sympy.sets.fancysets import Range + +# These are defined in the other file so we can avoid importing sympy.codegen +# from the top-level 'import sympy'. Export them here as well. +from sympy.printing.codeprinter import ccode, print_ccode # noqa:F401 + +# dictionary mapping SymPy function to (argument_conditions, C_function). +# Used in C89CodePrinter._print_Function(self) +known_functions_C89 = { + "Abs": [(lambda x: not x.is_integer, "fabs"), (lambda x: x.is_integer, "abs")], + "sin": "sin", + "cos": "cos", + "tan": "tan", + "asin": "asin", + "acos": "acos", + "atan": "atan", + "atan2": "atan2", + "exp": "exp", + "log": "log", + "log10": "log10", + "sinh": "sinh", + "cosh": "cosh", + "tanh": "tanh", + "floor": "floor", + "ceiling": "ceil", + "sqrt": "sqrt", # To enable automatic rewrites +} + +known_functions_C99 = dict(known_functions_C89, **{ + 'exp2': 'exp2', + 'expm1': 'expm1', + 'log2': 'log2', + 'log1p': 'log1p', + 'Cbrt': 'cbrt', + 'hypot': 'hypot', + 'fma': 'fma', + 'loggamma': 'lgamma', + 'erfc': 'erfc', + 'Max': 'fmax', + 'Min': 'fmin', + "asinh": "asinh", + "acosh": "acosh", + "atanh": "atanh", + "erf": "erf", + "gamma": "tgamma", +}) + +# These are the core reserved words in the C language. Taken from: +# https://en.cppreference.com/w/c/keyword + +reserved_words = [ + 'auto', 'break', 'case', 'char', 'const', 'continue', 'default', 'do', + 'double', 'else', 'enum', 'extern', 'float', 'for', 'goto', 'if', 'int', + 'long', 'register', 'return', 'short', 'signed', 'sizeof', 'static', + 'struct', 'entry', # never standardized, we'll leave it here anyway + 'switch', 'typedef', 'union', 'unsigned', 'void', 'volatile', 'while' +] + +reserved_words_c99 = ['inline', 'restrict'] + +def get_math_macros(): + """ Returns a dictionary with math-related macros from math.h/cmath + + Note that these macros are not strictly required by the C/C++-standard. + For MSVC they are enabled by defining "_USE_MATH_DEFINES" (preferably + via a compilation flag). + + Returns + ======= + + Dictionary mapping SymPy expressions to strings (macro names) + + """ + from sympy.codegen.cfunctions import log2, Sqrt + from sympy.functions.elementary.exponential import log + from sympy.functions.elementary.miscellaneous import sqrt + + return { + S.Exp1: 'M_E', + log2(S.Exp1): 'M_LOG2E', + 1/log(2): 'M_LOG2E', + log(2): 'M_LN2', + log(10): 'M_LN10', + S.Pi: 'M_PI', + S.Pi/2: 'M_PI_2', + S.Pi/4: 'M_PI_4', + 1/S.Pi: 'M_1_PI', + 2/S.Pi: 'M_2_PI', + 2/sqrt(S.Pi): 'M_2_SQRTPI', + 2/Sqrt(S.Pi): 'M_2_SQRTPI', + sqrt(2): 'M_SQRT2', + Sqrt(2): 'M_SQRT2', + 1/sqrt(2): 'M_SQRT1_2', + 1/Sqrt(2): 'M_SQRT1_2' + } + + +def _as_macro_if_defined(meth): + """ Decorator for printer methods + + When a Printer's method is decorated using this decorator the expressions printed + will first be looked for in the attribute ``math_macros``, and if present it will + print the macro name in ``math_macros`` followed by a type suffix for the type + ``real``. e.g. printing ``sympy.pi`` would print ``M_PIl`` if real is mapped to float80. + + """ + @wraps(meth) + def _meth_wrapper(self, expr, **kwargs): + if expr in self.math_macros: + return '%s%s' % (self.math_macros[expr], self._get_math_macro_suffix(real)) + else: + return meth(self, expr, **kwargs) + + return _meth_wrapper + + +class C89CodePrinter(CodePrinter): + """A printer to convert Python expressions to strings of C code""" + printmethod = "_ccode" + language = "C" + standard = "C89" + reserved_words = set(reserved_words) + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'contract': True, + 'dereference': set(), + 'error_on_reserved': False, + }) + + type_aliases = { + real: float64, + complex_: complex128, + integer: intc + } + + type_mappings: dict[Type, Any] = { + real: 'double', + intc: 'int', + float32: 'float', + float64: 'double', + integer: 'int', + bool_: 'bool', + int8: 'int8_t', + int16: 'int16_t', + int32: 'int32_t', + int64: 'int64_t', + uint8: 'int8_t', + uint16: 'int16_t', + uint32: 'int32_t', + uint64: 'int64_t', + } + + type_headers = { + bool_: {'stdbool.h'}, + int8: {'stdint.h'}, + int16: {'stdint.h'}, + int32: {'stdint.h'}, + int64: {'stdint.h'}, + uint8: {'stdint.h'}, + uint16: {'stdint.h'}, + uint32: {'stdint.h'}, + uint64: {'stdint.h'}, + } + + # Macros needed to be defined when using a Type + type_macros: dict[Type, tuple[str, ...]] = {} + + type_func_suffixes = { + float32: 'f', + float64: '', + float80: 'l' + } + + type_literal_suffixes = { + float32: 'F', + float64: '', + float80: 'L' + } + + type_math_macro_suffixes = { + float80: 'l' + } + + math_macros = None + + _ns = '' # namespace, C++ uses 'std::' + # known_functions-dict to copy + _kf: dict[str, Any] = known_functions_C89 + + def __init__(self, settings=None): + settings = settings or {} + if self.math_macros is None: + self.math_macros = settings.pop('math_macros', get_math_macros()) + self.type_aliases = dict(chain(self.type_aliases.items(), + settings.pop('type_aliases', {}).items())) + self.type_mappings = dict(chain(self.type_mappings.items(), + settings.pop('type_mappings', {}).items())) + self.type_headers = dict(chain(self.type_headers.items(), + settings.pop('type_headers', {}).items())) + self.type_macros = dict(chain(self.type_macros.items(), + settings.pop('type_macros', {}).items())) + self.type_func_suffixes = dict(chain(self.type_func_suffixes.items(), + settings.pop('type_func_suffixes', {}).items())) + self.type_literal_suffixes = dict(chain(self.type_literal_suffixes.items(), + settings.pop('type_literal_suffixes', {}).items())) + self.type_math_macro_suffixes = dict(chain(self.type_math_macro_suffixes.items(), + settings.pop('type_math_macro_suffixes', {}).items())) + super().__init__(settings) + self.known_functions = dict(self._kf, **settings.get('user_functions', {})) + self._dereference = set(settings.get('dereference', [])) + self.headers = set() + self.libraries = set() + self.macros = set() + + def _rate_index_position(self, p): + return p*5 + + def _get_statement(self, codestring): + """ Get code string as a statement - i.e. ending with a semicolon. """ + return codestring if codestring.endswith(';') else codestring + ';' + + def _get_comment(self, text): + return "/* {} */".format(text) + + def _declare_number_const(self, name, value): + type_ = self.type_aliases[real] + var = Variable(name, type=type_, value=value.evalf(type_.decimal_dig), attrs={value_const}) + decl = Declaration(var) + return self._get_statement(self._print(decl)) + + def _format_code(self, lines): + return self.indent_code(lines) + + def _traverse_matrix_indices(self, mat): + rows, cols = mat.shape + return ((i, j) for i in range(rows) for j in range(cols)) + + @_as_macro_if_defined + def _print_Mul(self, expr, **kwargs): + return super()._print_Mul(expr, **kwargs) + + @_as_macro_if_defined + def _print_Pow(self, expr): + if "Pow" in self.known_functions: + return self._print_Function(expr) + PREC = precedence(expr) + suffix = self._get_func_suffix(real) + if equal_valued(expr.exp, -1): + return '%s/%s' % (self._print_Float(Float(1.0)), self.parenthesize(expr.base, PREC)) + elif equal_valued(expr.exp, 0.5): + return '%ssqrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) + elif expr.exp == S.One/3 and self.standard != 'C89': + return '%scbrt%s(%s)' % (self._ns, suffix, self._print(expr.base)) + else: + return '%spow%s(%s, %s)' % (self._ns, suffix, self._print(expr.base), + self._print(expr.exp)) + + def _print_Mod(self, expr): + num, den = expr.args + if num.is_integer and den.is_integer: + PREC = precedence(expr) + snum, sden = [self.parenthesize(arg, PREC) for arg in expr.args] + # % is remainder (same sign as numerator), not modulo (same sign as + # denominator), in C. Hence, % only works as modulo if both numbers + # have the same sign + if (num.is_nonnegative and den.is_nonnegative or + num.is_nonpositive and den.is_nonpositive): + return f"{snum} % {sden}" + return f"(({snum} % {sden}) + {sden}) % {sden}" + # Not guaranteed integer + return self._print_math_func(expr, known='fmod') + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + suffix = self._get_literal_suffix(real) + return '%d.0%s/%d.0%s' % (p, suffix, q, suffix) + + def _print_Indexed(self, expr): + # calculate index for 1d array + offset = getattr(expr.base, 'offset', S.Zero) + strides = getattr(expr.base, 'strides', None) + indices = expr.indices + + if strides is None or isinstance(strides, str): + dims = expr.shape + shift = S.One + temp = () + if strides == 'C' or strides is None: + traversal = reversed(range(expr.rank)) + indices = indices[::-1] + elif strides == 'F': + traversal = range(expr.rank) + + for i in traversal: + temp += (shift,) + shift *= dims[i] + strides = temp + flat_index = sum(x[0]*x[1] for x in zip(indices, strides)) + offset + return "%s[%s]" % (self._print(expr.base.label), + self._print(flat_index)) + + @_as_macro_if_defined + def _print_NumberSymbol(self, expr): + return super()._print_NumberSymbol(expr) + + def _print_Infinity(self, expr): + return 'HUGE_VAL' + + def _print_NegativeInfinity(self, expr): + return '-HUGE_VAL' + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if expr.has(Assignment): + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s) {" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else {") + else: + lines.append("else if (%s) {" % self._print(c)) + code0 = self._print(e) + lines.append(code0) + lines.append("}") + return "\n".join(lines) + else: + # The piecewise was used in an expression, need to do inline + # operators. This has the downside that inline operators will + # not work for statements that span multiple lines (Matrix or + # Indexed expressions). + ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), + self._print(e)) + for e, c in expr.args[:-1]] + last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) + return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) + + def _print_ITE(self, expr): + from sympy.functions import Piecewise + return self._print(expr.rewrite(Piecewise, deep=False)) + + def _print_MatrixElement(self, expr): + return "{}[{}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], + strict=True), expr.j + expr.i*expr.parent.shape[1]) + + def _print_Symbol(self, expr): + name = super()._print_Symbol(expr) + if expr in self._settings['dereference']: + return '(*{})'.format(name) + else: + return name + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_For(self, expr): + target = self._print(expr.target) + if isinstance(expr.iterable, Range): + start, stop, step = expr.iterable.args + else: + raise NotImplementedError("Only iterable currently supported is Range") + body = self._print(expr.body) + return ('for ({target} = {start}; {target} < {stop}; {target} += ' + '{step}) {{\n{body}\n}}').format(target=target, start=start, + stop=stop, step=step, body=body) + + def _print_sign(self, func): + return '((({0}) > 0) - (({0}) < 0))'.format(self._print(func.args[0])) + + def _print_Max(self, expr): + if "Max" in self.known_functions: + return self._print_Function(expr) + def inner_print_max(args): # The more natural abstraction of creating + if len(args) == 1: # and printing smaller Max objects is slow + return self._print(args[0]) # when there are many arguments. + half = len(args) // 2 + return "((%(a)s > %(b)s) ? %(a)s : %(b)s)" % { + 'a': inner_print_max(args[:half]), + 'b': inner_print_max(args[half:]) + } + return inner_print_max(expr.args) + + def _print_Min(self, expr): + if "Min" in self.known_functions: + return self._print_Function(expr) + def inner_print_min(args): # The more natural abstraction of creating + if len(args) == 1: # and printing smaller Min objects is slow + return self._print(args[0]) # when there are many arguments. + half = len(args) // 2 + return "((%(a)s < %(b)s) ? %(a)s : %(b)s)" % { + 'a': inner_print_min(args[:half]), + 'b': inner_print_min(args[half:]) + } + return inner_print_min(expr.args) + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_token = ('{', '(', '{\n', '(\n') + dec_token = ('}', ')') + + code = [line.lstrip(' \t') for line in code] + + increase = [int(any(map(line.endswith, inc_token))) for line in code] + decrease = [int(any(map(line.startswith, dec_token))) for line in code] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + def _get_func_suffix(self, type_): + return self.type_func_suffixes[self.type_aliases.get(type_, type_)] + + def _get_literal_suffix(self, type_): + return self.type_literal_suffixes[self.type_aliases.get(type_, type_)] + + def _get_math_macro_suffix(self, type_): + alias = self.type_aliases.get(type_, type_) + dflt = self.type_math_macro_suffixes.get(alias, '') + return self.type_math_macro_suffixes.get(type_, dflt) + + def _print_Tuple(self, expr): + return '{'+', '.join(self._print(e) for e in expr)+'}' + + _print_List = _print_Tuple + + def _print_Type(self, type_): + self.headers.update(self.type_headers.get(type_, set())) + self.macros.update(self.type_macros.get(type_, set())) + return self._print(self.type_mappings.get(type_, type_.name)) + + def _print_Declaration(self, decl): + from sympy.codegen.cnodes import restrict + var = decl.variable + val = var.value + if var.type == untyped: + raise ValueError("C does not support untyped variables") + + if isinstance(var, Pointer): + result = '{vc}{t} *{pc} {r}{s}'.format( + vc='const ' if value_const in var.attrs else '', + t=self._print(var.type), + pc=' const' if pointer_const in var.attrs else '', + r='restrict ' if restrict in var.attrs else '', + s=self._print(var.symbol) + ) + elif isinstance(var, Variable): + result = '{vc}{t} {s}'.format( + vc='const ' if value_const in var.attrs else '', + t=self._print(var.type), + s=self._print(var.symbol) + ) + else: + raise NotImplementedError("Unknown type of var: %s" % type(var)) + if val != None: # Must be "!= None", cannot be "is not None" + result += ' = %s' % self._print(val) + return result + + def _print_Float(self, flt): + type_ = self.type_aliases.get(real, real) + self.macros.update(self.type_macros.get(type_, set())) + suffix = self._get_literal_suffix(type_) + num = str(flt.evalf(type_.decimal_dig)) + if 'e' not in num and '.' not in num: + num += '.0' + num_parts = num.split('e') + num_parts[0] = num_parts[0].rstrip('0') + if num_parts[0].endswith('.'): + num_parts[0] += '0' + return 'e'.join(num_parts) + suffix + + @requires(headers={'stdbool.h'}) + def _print_BooleanTrue(self, expr): + return 'true' + + @requires(headers={'stdbool.h'}) + def _print_BooleanFalse(self, expr): + return 'false' + + def _print_Element(self, elem): + if elem.strides == None: # Must be "== None", cannot be "is None" + if elem.offset != None: # Must be "!= None", cannot be "is not None" + raise ValueError("Expected strides when offset is given") + idxs = ']['.join((self._print(arg) for arg in elem.indices)) + else: + global_idx = sum(i*s for i, s in zip(elem.indices, elem.strides)) + if elem.offset != None: # Must be "!= None", cannot be "is not None" + global_idx += elem.offset + idxs = self._print(global_idx) + + return "{symb}[{idxs}]".format( + symb=self._print(elem.symbol), + idxs=idxs + ) + + def _print_CodeBlock(self, expr): + """ Elements of code blocks printed as statements. """ + return '\n'.join([self._get_statement(self._print(i)) for i in expr.args]) + + def _print_While(self, expr): + return 'while ({condition}) {{\n{body}\n}}'.format(**expr.kwargs( + apply=lambda arg: self._print(arg))) + + def _print_Scope(self, expr): + return '{\n%s\n}' % self._print_CodeBlock(expr.body) + + @requires(headers={'stdio.h'}) + def _print_Print(self, expr): + if expr.file == none: + template = 'printf({fmt}, {pargs})' + else: + template = 'fprintf(%(out)s, {fmt}, {pargs})' % { + 'out': self._print(expr.file) + } + return template.format( + fmt="%s\n" if expr.format_string == none else self._print(expr.format_string), + pargs=', '.join((self._print(arg) for arg in expr.print_args)) + ) + + def _print_Stream(self, strm): + return strm.name + + def _print_FunctionPrototype(self, expr): + pars = ', '.join((self._print(Declaration(arg)) for arg in expr.parameters)) + return "%s %s(%s)" % ( + tuple((self._print(arg) for arg in (expr.return_type, expr.name))) + (pars,) + ) + + def _print_FunctionDefinition(self, expr): + return "%s%s" % (self._print_FunctionPrototype(expr), + self._print_Scope(expr)) + + def _print_Return(self, expr): + arg, = expr.args + return 'return %s' % self._print(arg) + + def _print_CommaOperator(self, expr): + return '(%s)' % ', '.join((self._print(arg) for arg in expr.args)) + + def _print_Label(self, expr): + if expr.body == none: + return '%s:' % str(expr.name) + if len(expr.body.args) == 1: + return '%s:\n%s' % (str(expr.name), self._print_CodeBlock(expr.body)) + return '%s:\n{\n%s\n}' % (str(expr.name), self._print_CodeBlock(expr.body)) + + def _print_goto(self, expr): + return 'goto %s' % expr.label.name + + def _print_PreIncrement(self, expr): + arg, = expr.args + return '++(%s)' % self._print(arg) + + def _print_PostIncrement(self, expr): + arg, = expr.args + return '(%s)++' % self._print(arg) + + def _print_PreDecrement(self, expr): + arg, = expr.args + return '--(%s)' % self._print(arg) + + def _print_PostDecrement(self, expr): + arg, = expr.args + return '(%s)--' % self._print(arg) + + def _print_struct(self, expr): + return "%(keyword)s %(name)s {\n%(lines)s}" % { + "keyword": expr.__class__.__name__, "name": expr.name, "lines": ';\n'.join( + [self._print(decl) for decl in expr.declarations] + ['']) + } + + def _print_BreakToken(self, _): + return 'break' + + def _print_ContinueToken(self, _): + return 'continue' + + _print_union = _print_struct + +class C99CodePrinter(C89CodePrinter): + standard = 'C99' + reserved_words = set(reserved_words + reserved_words_c99) + type_mappings=dict(chain(C89CodePrinter.type_mappings.items(), { + complex64: 'float complex', + complex128: 'double complex', + }.items())) + type_headers = dict(chain(C89CodePrinter.type_headers.items(), { + complex64: {'complex.h'}, + complex128: {'complex.h'} + }.items())) + + # known_functions-dict to copy + _kf: dict[str, Any] = known_functions_C99 + + # functions with versions with 'f' and 'l' suffixes: + _prec_funcs = ('fabs fmod remainder remquo fma fmax fmin fdim nan exp exp2' + ' expm1 log log10 log2 log1p pow sqrt cbrt hypot sin cos tan' + ' asin acos atan atan2 sinh cosh tanh asinh acosh atanh erf' + ' erfc tgamma lgamma ceil floor trunc round nearbyint rint' + ' frexp ldexp modf scalbn ilogb logb nextafter copysign').split() + + def _print_Infinity(self, expr): + return 'INFINITY' + + def _print_NegativeInfinity(self, expr): + return '-INFINITY' + + def _print_NaN(self, expr): + return 'NAN' + + # tgamma was already covered by 'known_functions' dict + + @requires(headers={'math.h'}, libraries={'m'}) + @_as_macro_if_defined + def _print_math_func(self, expr, nest=False, known=None): + if known is None: + known = self.known_functions[expr.__class__.__name__] + if not isinstance(known, str): + for cb, name in known: + if cb(*expr.args): + known = name + break + else: + raise ValueError("No matching printer") + try: + return known(self, *expr.args) + except TypeError: + suffix = self._get_func_suffix(real) if self._ns + known in self._prec_funcs else '' + + if nest: + args = self._print(expr.args[0]) + if len(expr.args) > 1: + paren_pile = '' + for curr_arg in expr.args[1:-1]: + paren_pile += ')' + args += ', {ns}{name}{suffix}({next}'.format( + ns=self._ns, + name=known, + suffix=suffix, + next = self._print(curr_arg) + ) + args += ', %s%s' % ( + self._print(expr.func(expr.args[-1])), + paren_pile + ) + else: + args = ', '.join((self._print(arg) for arg in expr.args)) + return '{ns}{name}{suffix}({args})'.format( + ns=self._ns, + name=known, + suffix=suffix, + args=args + ) + + def _print_Max(self, expr): + return self._print_math_func(expr, nest=True) + + def _print_Min(self, expr): + return self._print_math_func(expr, nest=True) + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + loopstart = "for (int %(var)s=%(start)s; %(var)s<%(end)s; %(var)s++){" # C99 + for i in indices: + # C arrays start at 0 and end at dimension-1 + open_lines.append(loopstart % { + 'var': self._print(i.label), + 'start': self._print(i.lower), + 'end': self._print(i.upper + 1)}) + close_lines.append("}") + return open_lines, close_lines + + +for k in ('Abs Sqrt exp exp2 expm1 log log10 log2 log1p Cbrt hypot fma' + ' loggamma sin cos tan asin acos atan atan2 sinh cosh tanh asinh acosh ' + 'atanh erf erfc loggamma gamma ceiling floor').split(): + setattr(C99CodePrinter, '_print_%s' % k, C99CodePrinter._print_math_func) + + +class C11CodePrinter(C99CodePrinter): + + @requires(headers={'stdalign.h'}) + def _print_alignof(self, expr): + arg, = expr.args + return 'alignof(%s)' % self._print(arg) + + +c_code_printers = { + 'c89': C89CodePrinter, + 'c99': C99CodePrinter, + 'c11': C11CodePrinter +} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/codeprinter.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/codeprinter.py new file mode 100644 index 0000000000000000000000000000000000000000..1faaa0f054cbd8ff438b90e914808f720d2da90a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/codeprinter.py @@ -0,0 +1,1039 @@ +from __future__ import annotations +from typing import Any + +from functools import wraps + +from sympy.core import Add, Mul, Pow, S, sympify, Float +from sympy.core.basic import Basic +from sympy.core.expr import Expr, UnevaluatedExpr +from sympy.core.function import Lambda +from sympy.core.mul import _keep_coeff +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import re +from sympy.printing.str import StrPrinter +from sympy.printing.precedence import precedence, PRECEDENCE + + +class requires: + """ Decorator for registering requirements on print methods. """ + def __init__(self, **kwargs): + self._req = kwargs + + def __call__(self, method): + def _method_wrapper(self_, *args, **kwargs): + for k, v in self._req.items(): + getattr(self_, k).update(v) + return method(self_, *args, **kwargs) + return wraps(method)(_method_wrapper) + + +class AssignmentError(Exception): + """ + Raised if an assignment variable for a loop is missing. + """ + pass + +class PrintMethodNotImplementedError(NotImplementedError): + """ + Raised if a _print_* method is missing in the Printer. + """ + pass + +def _convert_python_lists(arg): + if isinstance(arg, list): + from sympy.codegen.abstract_nodes import List + return List(*(_convert_python_lists(e) for e in arg)) + elif isinstance(arg, tuple): + return tuple(_convert_python_lists(e) for e in arg) + else: + return arg + + +class CodePrinter(StrPrinter): + """ + The base class for code-printing subclasses. + """ + + _operators = { + 'and': '&&', + 'or': '||', + 'not': '!', + } + + _default_settings: dict[str, Any] = { + 'order': None, + 'full_prec': 'auto', + 'error_on_reserved': False, + 'reserved_word_suffix': '_', + 'human': True, + 'inline': False, + 'allow_unknown_functions': False, + 'strict': None # True or False; None => True if human == True + } + + # Functions which are "simple" to rewrite to other functions that + # may be supported + # function_to_rewrite : (function_to_rewrite_to, iterable_with_other_functions_required) + _rewriteable_functions = { + 'cot': ('tan', []), + 'csc': ('sin', []), + 'sec': ('cos', []), + 'acot': ('atan', []), + 'acsc': ('asin', []), + 'asec': ('acos', []), + 'coth': ('exp', []), + 'csch': ('exp', []), + 'sech': ('exp', []), + 'acoth': ('log', []), + 'acsch': ('log', []), + 'asech': ('log', []), + 'catalan': ('gamma', []), + 'fibonacci': ('sqrt', []), + 'lucas': ('sqrt', []), + 'beta': ('gamma', []), + 'sinc': ('sin', ['Piecewise']), + 'Mod': ('floor', []), + 'factorial': ('gamma', []), + 'factorial2': ('gamma', ['Piecewise']), + 'subfactorial': ('uppergamma', []), + 'RisingFactorial': ('gamma', ['Piecewise']), + 'FallingFactorial': ('gamma', ['Piecewise']), + 'binomial': ('gamma', []), + 'frac': ('floor', []), + 'Max': ('Piecewise', []), + 'Min': ('Piecewise', []), + 'Heaviside': ('Piecewise', []), + 'erf2': ('erf', []), + 'erfc': ('erf', []), + 'Li': ('li', []), + 'Ei': ('li', []), + 'dirichlet_eta': ('zeta', []), + 'riemann_xi': ('zeta', ['gamma']), + 'SingularityFunction': ('Piecewise', []), + } + + def __init__(self, settings=None): + super().__init__(settings=settings) + if self._settings.get('strict', True) == None: + # for backwards compatibility, human=False need not to throw: + self._settings['strict'] = self._settings.get('human', True) == True + if not hasattr(self, 'reserved_words'): + self.reserved_words = set() + + def _handle_UnevaluatedExpr(self, expr): + return expr.replace(re, lambda arg: arg if isinstance( + arg, UnevaluatedExpr) and arg.args[0].is_real else re(arg)) + + def doprint(self, expr, assign_to=None): + """ + Print the expression as code. + + Parameters + ---------- + expr : Expression + The expression to be printed. + + assign_to : Symbol, string, MatrixSymbol, list of strings or Symbols (optional) + If provided, the printed code will set the expression to a variable or multiple variables + with the name or names given in ``assign_to``. + """ + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.codegen.ast import CodeBlock, Assignment + + def _handle_assign_to(expr, assign_to): + if assign_to is None: + return sympify(expr) + if isinstance(assign_to, (list, tuple)): + if len(expr) != len(assign_to): + raise ValueError('Failed to assign an expression of length {} to {} variables'.format(len(expr), len(assign_to))) + return CodeBlock(*[_handle_assign_to(lhs, rhs) for lhs, rhs in zip(expr, assign_to)]) + if isinstance(assign_to, str): + if expr.is_Matrix: + assign_to = MatrixSymbol(assign_to, *expr.shape) + else: + assign_to = Symbol(assign_to) + elif not isinstance(assign_to, Basic): + raise TypeError("{} cannot assign to object of type {}".format( + type(self).__name__, type(assign_to))) + return Assignment(assign_to, expr) + + expr = _convert_python_lists(expr) + expr = _handle_assign_to(expr, assign_to) + + # Remove re(...) nodes due to UnevaluatedExpr.is_real always is None: + expr = self._handle_UnevaluatedExpr(expr) + + # keep a set of expressions that are not strictly translatable to Code + # and number constants that must be declared and initialized + self._not_supported = set() + self._number_symbols = set() + + lines = self._print(expr).splitlines() + + # format the output + if self._settings["human"]: + frontlines = [] + if self._not_supported: + frontlines.append(self._get_comment( + "Not supported in {}:".format(self.language))) + for expr in sorted(self._not_supported, key=str): + frontlines.append(self._get_comment(type(expr).__name__)) + for name, value in sorted(self._number_symbols, key=str): + frontlines.append(self._declare_number_const(name, value)) + lines = frontlines + lines + lines = self._format_code(lines) + result = "\n".join(lines) + else: + lines = self._format_code(lines) + num_syms = {(k, self._print(v)) for k, v in self._number_symbols} + result = (num_syms, self._not_supported, "\n".join(lines)) + self._not_supported = set() + self._number_symbols = set() + return result + + def _doprint_loops(self, expr, assign_to=None): + # Here we print an expression that contains Indexed objects, they + # correspond to arrays in the generated code. The low-level implementation + # involves looping over array elements and possibly storing results in temporary + # variables or accumulate it in the assign_to object. + + if self._settings.get('contract', True): + from sympy.tensor import get_contraction_structure + # Setup loops over non-dummy indices -- all terms need these + indices = self._get_expression_indices(expr, assign_to) + # Setup loops over dummy indices -- each term needs separate treatment + dummies = get_contraction_structure(expr) + else: + indices = [] + dummies = {None: (expr,)} + openloop, closeloop = self._get_loop_opening_ending(indices) + + # terms with no summations first + if None in dummies: + text = StrPrinter.doprint(self, Add(*dummies[None])) + else: + # If all terms have summations we must initialize array to Zero + text = StrPrinter.doprint(self, 0) + + # skip redundant assignments (where lhs == rhs) + lhs_printed = self._print(assign_to) + lines = [] + if text != lhs_printed: + lines.extend(openloop) + if assign_to is not None: + text = self._get_statement("%s = %s" % (lhs_printed, text)) + lines.append(text) + lines.extend(closeloop) + + # then terms with summations + for d in dummies: + if isinstance(d, tuple): + indices = self._sort_optimized(d, expr) + openloop_d, closeloop_d = self._get_loop_opening_ending( + indices) + + for term in dummies[d]: + if term in dummies and not ([list(f.keys()) for f in dummies[term]] + == [[None] for f in dummies[term]]): + # If one factor in the term has it's own internal + # contractions, those must be computed first. + # (temporary variables?) + raise NotImplementedError( + "FIXME: no support for contractions in factor yet") + else: + + # We need the lhs expression as an accumulator for + # the loops, i.e + # + # for (int d=0; d < dim; d++){ + # lhs[] = lhs[] + term[][d] + # } ^.................. the accumulator + # + # We check if the expression already contains the + # lhs, and raise an exception if it does, as that + # syntax is currently undefined. FIXME: What would be + # a good interpretation? + if assign_to is None: + raise AssignmentError( + "need assignment variable for loops") + if term.has(assign_to): + raise ValueError("FIXME: lhs present in rhs,\ + this is undefined in CodePrinter") + + lines.extend(openloop) + lines.extend(openloop_d) + text = "%s = %s" % (lhs_printed, StrPrinter.doprint( + self, assign_to + term)) + lines.append(self._get_statement(text)) + lines.extend(closeloop_d) + lines.extend(closeloop) + + return "\n".join(lines) + + def _get_expression_indices(self, expr, assign_to): + from sympy.tensor import get_indices + rinds, junk = get_indices(expr) + linds, junk = get_indices(assign_to) + + # support broadcast of scalar + if linds and not rinds: + rinds = linds + if rinds != linds: + raise ValueError("lhs indices must match non-dummy" + " rhs indices in %s" % expr) + + return self._sort_optimized(rinds, assign_to) + + def _sort_optimized(self, indices, expr): + + from sympy.tensor.indexed import Indexed + + if not indices: + return [] + + # determine optimized loop order by giving a score to each index + # the index with the highest score are put in the innermost loop. + score_table = {} + for i in indices: + score_table[i] = 0 + + arrays = expr.atoms(Indexed) + for arr in arrays: + for p, ind in enumerate(arr.indices): + try: + score_table[ind] += self._rate_index_position(p) + except KeyError: + pass + + return sorted(indices, key=lambda x: score_table[x]) + + def _rate_index_position(self, p): + """function to calculate score based on position among indices + + This method is used to sort loops in an optimized order, see + CodePrinter._sort_optimized() + """ + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _get_statement(self, codestring): + """Formats a codestring with the proper line ending.""" + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _get_comment(self, text): + """Formats a text string as a comment.""" + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _declare_number_const(self, name, value): + """Declare a numeric constant at the top of a function""" + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _format_code(self, lines): + """Take in a list of lines of code, and format them accordingly. + + This may include indenting, wrapping long lines, etc...""" + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _get_loop_opening_ending(self, indices): + """Returns a tuple (open_lines, close_lines) containing lists + of codelines""" + raise NotImplementedError("This function must be implemented by " + "subclass of CodePrinter.") + + def _print_Dummy(self, expr): + if expr.name.startswith('Dummy_'): + return '_' + expr.name + else: + return '%s_%d' % (expr.name, expr.dummy_index) + + def _print_Idx(self, expr): + return self._print(expr.label) + + def _print_CodeBlock(self, expr): + return '\n'.join([self._print(i) for i in expr.args]) + + def _print_String(self, string): + return str(string) + + def _print_QuotedString(self, arg): + return '"%s"' % arg.text + + def _print_Comment(self, string): + return self._get_comment(str(string)) + + def _print_Assignment(self, expr): + from sympy.codegen.ast import Assignment + from sympy.functions.elementary.piecewise import Piecewise + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.tensor.indexed import IndexedBase + lhs = expr.lhs + rhs = expr.rhs + # We special case assignments that take multiple lines + if isinstance(expr.rhs, Piecewise): + # Here we modify Piecewise so each expression is now + # an Assignment, and then continue on the print. + expressions = [] + conditions = [] + for (e, c) in rhs.args: + expressions.append(Assignment(lhs, e)) + conditions.append(c) + temp = Piecewise(*zip(expressions, conditions)) + return self._print(temp) + elif isinstance(lhs, MatrixSymbol): + # Here we form an Assignment for each element in the array, + # printing each one. + lines = [] + for (i, j) in self._traverse_matrix_indices(lhs): + temp = Assignment(lhs[i, j], rhs[i, j]) + code0 = self._print(temp) + lines.append(code0) + return "\n".join(lines) + elif self._settings.get("contract", False) and (lhs.has(IndexedBase) or + rhs.has(IndexedBase)): + # Here we check if there is looping to be done, and if so + # print the required loops. + return self._doprint_loops(rhs, lhs) + else: + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + return self._get_statement("%s = %s" % (lhs_code, rhs_code)) + + def _print_AugmentedAssignment(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + return self._get_statement("{} {} {}".format( + *(self._print(arg) for arg in [lhs_code, expr.op, rhs_code]))) + + def _print_FunctionCall(self, expr): + return '%s(%s)' % ( + expr.name, + ', '.join((self._print(arg) for arg in expr.function_args))) + + def _print_Variable(self, expr): + return self._print(expr.symbol) + + def _print_Symbol(self, expr): + name = super()._print_Symbol(expr) + + if name in self.reserved_words: + if self._settings['error_on_reserved']: + msg = ('This expression includes the symbol "{}" which is a ' + 'reserved keyword in this language.') + raise ValueError(msg.format(name)) + return name + self._settings['reserved_word_suffix'] + else: + return name + + def _can_print(self, name): + """ Check if function ``name`` is either a known function or has its own + printing method. Used to check if rewriting is possible.""" + return name in self.known_functions or getattr(self, '_print_{}'.format(name), False) + + def _print_Function(self, expr): + if expr.func.__name__ in self.known_functions: + cond_func = self.known_functions[expr.func.__name__] + if isinstance(cond_func, str): + return "%s(%s)" % (cond_func, self.stringify(expr.args, ", ")) + else: + for cond, func in cond_func: + if cond(*expr.args): + break + if func is not None: + try: + return func(*[self.parenthesize(item, 0) for item in expr.args]) + except TypeError: + return "%s(%s)" % (func, self.stringify(expr.args, ", ")) + elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): + # inlined function + return self._print(expr._imp_(*expr.args)) + elif expr.func.__name__ in self._rewriteable_functions: + # Simple rewrite to supported function possible + target_f, required_fs = self._rewriteable_functions[expr.func.__name__] + if self._can_print(target_f) and all(self._can_print(f) for f in required_fs): + return '(' + self._print(expr.rewrite(target_f)) + ')' + + if expr.is_Function and self._settings.get('allow_unknown_functions', False): + return '%s(%s)' % (self._print(expr.func), ', '.join(map(self._print, expr.args))) + else: + return self._print_not_supported(expr) + + _print_Expr = _print_Function + + def _print_Derivative(self, expr): + obj, *wrt_order_pairs = expr.args + for func_arg in obj.args: + if not func_arg.is_Symbol: + raise ValueError("%s._print_Derivative(...) only supports functions with symbols as arguments." % + self.__class__.__name__) + meth_name = '_print_Derivative_%s' % obj.func.__name__ + pmeth = getattr(self, meth_name, None) + if pmeth is None: + if self._settings.get('strict', False): + raise PrintMethodNotImplementedError( + f"Unsupported by {type(self)}: {type(expr)}" + + f"\nPrinter has no method: {meth_name}" + + "\nSet the printer option 'strict' to False in order to generate partially printed code." + ) + return self._print_not_supported(expr) + orders = dict(wrt_order_pairs) + seq_orders = [orders[arg] for arg in obj.args] + return pmeth(obj.args, seq_orders) + + # Don't inherit the str-printer method for Heaviside to the code printers + _print_Heaviside = None + + def _print_NumberSymbol(self, expr): + if self._settings.get("inline", False): + return self._print(Float(expr.evalf(self._settings["precision"]))) + else: + # A Number symbol that is not implemented here or with _printmethod + # is registered and evaluated + self._number_symbols.add((expr, + Float(expr.evalf(self._settings["precision"])))) + return str(expr) + + def _print_Catalan(self, expr): + return self._print_NumberSymbol(expr) + def _print_EulerGamma(self, expr): + return self._print_NumberSymbol(expr) + def _print_GoldenRatio(self, expr): + return self._print_NumberSymbol(expr) + def _print_TribonacciConstant(self, expr): + return self._print_NumberSymbol(expr) + def _print_Exp1(self, expr): + return self._print_NumberSymbol(expr) + def _print_Pi(self, expr): + return self._print_NumberSymbol(expr) + + def _print_And(self, expr): + PREC = precedence(expr) + return (" %s " % self._operators['and']).join(self.parenthesize(a, PREC) + for a in sorted(expr.args, key=default_sort_key)) + + def _print_Or(self, expr): + PREC = precedence(expr) + return (" %s " % self._operators['or']).join(self.parenthesize(a, PREC) + for a in sorted(expr.args, key=default_sort_key)) + + def _print_Xor(self, expr): + if self._operators.get('xor') is None: + return self._print(expr.to_nnf()) + PREC = precedence(expr) + return (" %s " % self._operators['xor']).join(self.parenthesize(a, PREC) + for a in expr.args) + + def _print_Equivalent(self, expr): + if self._operators.get('equivalent') is None: + return self._print(expr.to_nnf()) + PREC = precedence(expr) + return (" %s " % self._operators['equivalent']).join(self.parenthesize(a, PREC) + for a in expr.args) + + def _print_Not(self, expr): + PREC = precedence(expr) + return self._operators['not'] + self.parenthesize(expr.args[0], PREC) + + def _print_BooleanFunction(self, expr): + return self._print(expr.to_nnf()) + + def _print_isnan(self, arg): + return 'isnan(%s)' % self._print(*arg.args) + + def _print_isinf(self, arg): + return 'isinf(%s)' % self._print(*arg.args) + + def _print_Mul(self, expr): + + prec = precedence(expr) + + c, e = expr.as_coeff_Mul() + if c < 0: + expr = _keep_coeff(-c, e) + sign = "-" + else: + sign = "" + + a = [] # items in the numerator + b = [] # items that are in the denominator (if any) + + pow_paren = [] # Will collect all pow with more than one base element and exp = -1 + + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + # use make_args in case expr was something like -x -> x + args = Mul.make_args(expr) + + # Gather args for numerator/denominator + for item in args: + if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative: + if item.exp != -1: + b.append(Pow(item.base, -item.exp, evaluate=False)) + else: + if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 + pow_paren.append(item) + b.append(Pow(item.base, -item.exp)) + else: + a.append(item) + + a = a or [S.One] + + if len(a) == 1 and sign == "-": + # Unary minus does not have a SymPy class, and hence there's no + # precedence weight associated with it, Python's unary minus has + # an operator precedence between multiplication and exponentiation, + # so we use this to compute a weight. + a_str = [self.parenthesize(a[0], 0.5*(PRECEDENCE["Pow"]+PRECEDENCE["Mul"]))] + else: + a_str = [self.parenthesize(x, prec) for x in a] + b_str = [self.parenthesize(x, prec) for x in b] + + # To parenthesize Pow with exp = -1 and having more than one Symbol + for item in pow_paren: + if item.base in b: + b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] + + if not b: + return sign + '*'.join(a_str) + elif len(b) == 1: + return sign + '*'.join(a_str) + "/" + b_str[0] + else: + return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str) + + def _print_not_supported(self, expr): + if self._settings.get('strict', False): + raise PrintMethodNotImplementedError( + f"Unsupported by {type(self)}: {type(expr)}" + + "\nSet the printer option 'strict' to False in order to generate partially printed code." + ) + try: + self._not_supported.add(expr) + except TypeError: + # not hashable + pass + return self.emptyPrinter(expr) + + # The following can not be simply translated into C or Fortran + _print_Basic = _print_not_supported + _print_ComplexInfinity = _print_not_supported + _print_ExprCondPair = _print_not_supported + _print_GeometryEntity = _print_not_supported + _print_Infinity = _print_not_supported + _print_Integral = _print_not_supported + _print_Interval = _print_not_supported + _print_AccumulationBounds = _print_not_supported + _print_Limit = _print_not_supported + _print_MatrixBase = _print_not_supported + _print_DeferredVector = _print_not_supported + _print_NaN = _print_not_supported + _print_NegativeInfinity = _print_not_supported + _print_Order = _print_not_supported + _print_RootOf = _print_not_supported + _print_RootsOf = _print_not_supported + _print_RootSum = _print_not_supported + _print_Uniform = _print_not_supported + _print_Unit = _print_not_supported + _print_Wild = _print_not_supported + _print_WildFunction = _print_not_supported + _print_Relational = _print_not_supported + + +# Code printer functions. These are included in this file so that they can be +# imported in the top-level __init__.py without importing the sympy.codegen +# module. + +def ccode(expr, assign_to=None, standard='c99', **settings): + """Converts an expr to a string of c code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of + line-wrapping, or for expressions that generate multi-line statements. + standard : str, optional + String specifying the standard. If your compiler supports a more modern + standard you may set this to 'c99' to allow the printer to use more math + functions. [default='c89']. + precision : integer, optional + The precision for numbers such as pi [default=17]. + user_functions : dict, optional + A dictionary where the keys are string representations of either + ``FunctionClass`` or ``UndefinedFunction`` instances and the values + are their desired C string representations. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + cfunction_string)] or [(argument_test, cfunction_formater)]. See below + for examples. + dereference : iterable, optional + An iterable of symbols that should be dereferenced in the printed code + expression. These would be values passed by address to the function. + For example, if ``dereference=[a]``, the resulting code would print + ``(*a)`` instead of ``a``. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + + Examples + ======== + + >>> from sympy import ccode, symbols, Rational, sin, ceiling, Abs, Function + >>> x, tau = symbols("x, tau") + >>> expr = (2*tau)**Rational(7, 2) + >>> ccode(expr) + '8*M_SQRT2*pow(tau, 7.0/2.0)' + >>> ccode(expr, math_macros={}) + '8*sqrt(2)*pow(tau, 7.0/2.0)' + >>> ccode(sin(x), assign_to="s") + 's = sin(x);' + >>> from sympy.codegen.ast import real, float80 + >>> ccode(expr, type_aliases={real: float80}) + '8*M_SQRT2l*powl(tau, 7.0L/2.0L)' + + Simple custom printing can be defined for certain types by passing a + dictionary of {"type" : "function"} to the ``user_functions`` kwarg. + Alternatively, the dictionary value can be a list of tuples i.e. + [(argument_test, cfunction_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "Abs": [(lambda x: not x.is_integer, "fabs"), + ... (lambda x: x.is_integer, "ABS")], + ... "func": "f" + ... } + >>> func = Function('func') + >>> ccode(func(Abs(x) + ceiling(x)), standard='C89', user_functions=custom_functions) + 'f(fabs(x) + CEIL(x))' + + or if the C-function takes a subset of the original arguments: + + >>> ccode(2**x + 3**x, standard='C99', user_functions={'Pow': [ + ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), + ... (lambda b, e: b != 2, 'pow')]}) + 'exp2(x) + pow(3, x)' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(ccode(expr, tau, standard='C89')) + if (x > 0) { + tau = x + 1; + } + else { + tau = x; + } + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> ccode(e.rhs, assign_to=e.lhs, contract=False, standard='C89') + 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' + + Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions + must be provided to ``assign_to``. Note that any expression that can be + generated normally can also exist inside a Matrix: + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(ccode(mat, A, standard='C89')) + A[0] = pow(x, 2); + if (x > 0) { + A[1] = x + 1; + } + else { + A[1] = x; + } + A[2] = sin(x); + """ + from sympy.printing.c import c_code_printers + return c_code_printers[standard.lower()](settings).doprint(expr, assign_to) + +def print_ccode(expr, **settings): + """Prints C representation of the given expression.""" + print(ccode(expr, **settings)) + +def fcode(expr, assign_to=None, **settings): + """Converts an expr to a string of fortran code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of + line-wrapping, or for expressions that generate multi-line statements. + precision : integer, optional + DEPRECATED. Use type_mappings instead. The precision for numbers such + as pi [default=17]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, cfunction_string)]. See below + for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + source_format : optional + The source format can be either 'fixed' or 'free'. [default='fixed'] + standard : integer, optional + The Fortran standard to be followed. This is specified as an integer. + Acceptable standards are 66, 77, 90, 95, 2003, and 2008. Default is 77. + Note that currently the only distinction internally is between + standards before 95, and those 95 and after. This may change later as + more features are added. + name_mangling : bool, optional + If True, then the variables that would become identical in + case-insensitive Fortran are mangled by appending different number + of ``_`` at the end. If False, SymPy Will not interfere with naming of + variables. [default=True] + + Examples + ======== + + >>> from sympy import fcode, symbols, Rational, sin, ceiling, floor + >>> x, tau = symbols("x, tau") + >>> fcode((2*tau)**Rational(7, 2)) + ' 8*sqrt(2.0d0)*tau**(7.0d0/2.0d0)' + >>> fcode(sin(x), assign_to="s") + ' s = sin(x)' + + Custom printing can be defined for certain types by passing a dictionary of + "type" : "function" to the ``user_functions`` kwarg. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + cfunction_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "floor": [(lambda x: not x.is_integer, "FLOOR1"), + ... (lambda x: x.is_integer, "FLOOR2")] + ... } + >>> fcode(floor(x) + ceiling(x), user_functions=custom_functions) + ' CEIL(x) + FLOOR1(x)' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(fcode(expr, tau)) + if (x > 0) then + tau = x + 1 + else + tau = x + end if + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> fcode(e.rhs, assign_to=e.lhs, contract=False) + ' Dy(i) = (y(i + 1) - y(i))/(t(i + 1) - t(i))' + + Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions + must be provided to ``assign_to``. Note that any expression that can be + generated normally can also exist inside a Matrix: + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(fcode(mat, A)) + A(1, 1) = x**2 + if (x > 0) then + A(2, 1) = x + 1 + else + A(2, 1) = x + end if + A(3, 1) = sin(x) + """ + from sympy.printing.fortran import FCodePrinter + return FCodePrinter(settings).doprint(expr, assign_to) + + +def print_fcode(expr, **settings): + """Prints the Fortran representation of the given expression. + + See fcode for the meaning of the optional arguments. + """ + print(fcode(expr, **settings)) + +def cxxcode(expr, assign_to=None, standard='c++11', **settings): + """ C++ equivalent of :func:`~.ccode`. """ + from sympy.printing.cxx import cxx_code_printers + return cxx_code_printers[standard.lower()](settings).doprint(expr, assign_to) + + +def rust_code(expr, assign_to=None, **settings): + """Converts an expr to a string of Rust code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of + line-wrapping, or for expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=15]. + user_functions : dict, optional + A dictionary where the keys are string representations of either + ``FunctionClass`` or ``UndefinedFunction`` instances and the values + are their desired C string representations. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + cfunction_string)]. See below for examples. + dereference : iterable, optional + An iterable of symbols that should be dereferenced in the printed code + expression. These would be values passed by address to the function. + For example, if ``dereference=[a]``, the resulting code would print + ``(*a)`` instead of ``a``. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + + Examples + ======== + + >>> from sympy import rust_code, symbols, Rational, sin, ceiling, Abs, Function + >>> x, tau = symbols("x, tau") + >>> rust_code((2*tau)**Rational(7, 2)) + '8.0*1.4142135623731*tau.powf(7_f64/2.0)' + >>> rust_code(sin(x), assign_to="s") + 's = x.sin();' + + Simple custom printing can be defined for certain types by passing a + dictionary of {"type" : "function"} to the ``user_functions`` kwarg. + Alternatively, the dictionary value can be a list of tuples i.e. + [(argument_test, cfunction_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "Abs": [(lambda x: not x.is_integer, "fabs", 4), + ... (lambda x: x.is_integer, "ABS", 4)], + ... "func": "f" + ... } + >>> func = Function('func') + >>> rust_code(func(Abs(x) + ceiling(x)), user_functions=custom_functions) + '(fabs(x) + x.ceil()).f()' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(rust_code(expr, tau)) + tau = if (x > 0.0) { + x + 1 + } else { + x + }; + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> rust_code(e.rhs, assign_to=e.lhs, contract=False) + 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' + + Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions + must be provided to ``assign_to``. Note that any expression that can be + generated normally can also exist inside a Matrix: + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(rust_code(mat, A)) + A = [x.powi(2), if (x > 0.0) { + x + 1 + } else { + x + }, x.sin()]; + """ + from sympy.printing.rust import RustCodePrinter + printer = RustCodePrinter(settings) + expr = printer._rewrite_known_functions(expr) + if isinstance(expr, Expr): + for src_func, dst_func in printer.function_overrides.values(): + expr = expr.replace(src_func, dst_func) + return printer.doprint(expr, assign_to) + + +def print_rust_code(expr, **settings): + """Prints Rust representation of the given expression.""" + print(rust_code(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/conventions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/conventions.py new file mode 100644 index 0000000000000000000000000000000000000000..4f5545ae38511e0bb0366da5c9fb4e59156095c8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/conventions.py @@ -0,0 +1,88 @@ +""" +A few practical conventions common to all printers. +""" + +import re + +from collections.abc import Iterable +from sympy.core.function import Derivative + +_name_with_digits_p = re.compile(r'^([^\W\d_]+)(\d+)$', re.UNICODE) + + +def split_super_sub(text): + """Split a symbol name into a name, superscripts and subscripts + + The first part of the symbol name is considered to be its actual + 'name', followed by super- and subscripts. Each superscript is + preceded with a "^" character or by "__". Each subscript is preceded + by a "_" character. The three return values are the actual name, a + list with superscripts and a list with subscripts. + + Examples + ======== + + >>> from sympy.printing.conventions import split_super_sub + >>> split_super_sub('a_x^1') + ('a', ['1'], ['x']) + >>> split_super_sub('var_sub1__sup_sub2') + ('var', ['sup'], ['sub1', 'sub2']) + + """ + if not text: + return text, [], [] + + pos = 0 + name = None + supers = [] + subs = [] + while pos < len(text): + start = pos + 1 + if text[pos:pos + 2] == "__": + start += 1 + pos_hat = text.find("^", start) + if pos_hat < 0: + pos_hat = len(text) + pos_usc = text.find("_", start) + if pos_usc < 0: + pos_usc = len(text) + pos_next = min(pos_hat, pos_usc) + part = text[pos:pos_next] + pos = pos_next + if name is None: + name = part + elif part.startswith("^"): + supers.append(part[1:]) + elif part.startswith("__"): + supers.append(part[2:]) + elif part.startswith("_"): + subs.append(part[1:]) + else: + raise RuntimeError("This should never happen.") + + # Make a little exception when a name ends with digits, i.e. treat them + # as a subscript too. + m = _name_with_digits_p.match(name) + if m: + name, sub = m.groups() + subs.insert(0, sub) + + return name, supers, subs + + +def requires_partial(expr): + """Return whether a partial derivative symbol is required for printing + + This requires checking how many free variables there are, + filtering out the ones that are integers. Some expressions do not have + free variables. In that case, check its variable list explicitly to + get the context of the expression. + """ + + if isinstance(expr, Derivative): + return requires_partial(expr.expr) + + if not isinstance(expr.free_symbols, Iterable): + return len(set(expr.variables)) > 1 + + return sum(not s.is_integer for s in expr.free_symbols) > 1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/cxx.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/cxx.py new file mode 100644 index 0000000000000000000000000000000000000000..0ed4f468b866e1b44aba6ae94a85c740dd324689 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/cxx.py @@ -0,0 +1,181 @@ +""" +C++ code printer +""" + +from itertools import chain +from sympy.codegen.ast import Type, none +from .codeprinter import requires +from .c import C89CodePrinter, C99CodePrinter + +# These are defined in the other file so we can avoid importing sympy.codegen +# from the top-level 'import sympy'. Export them here as well. +from sympy.printing.codeprinter import cxxcode # noqa:F401 + +# from https://en.cppreference.com/w/cpp/keyword +reserved = { + 'C++98': [ + 'and', 'and_eq', 'asm', 'auto', 'bitand', 'bitor', 'bool', 'break', + 'case', 'catch,', 'char', 'class', 'compl', 'const', 'const_cast', + 'continue', 'default', 'delete', 'do', 'double', 'dynamic_cast', + 'else', 'enum', 'explicit', 'export', 'extern', 'false', 'float', + 'for', 'friend', 'goto', 'if', 'inline', 'int', 'long', 'mutable', + 'namespace', 'new', 'not', 'not_eq', 'operator', 'or', 'or_eq', + 'private', 'protected', 'public', 'register', 'reinterpret_cast', + 'return', 'short', 'signed', 'sizeof', 'static', 'static_cast', + 'struct', 'switch', 'template', 'this', 'throw', 'true', 'try', + 'typedef', 'typeid', 'typename', 'union', 'unsigned', 'using', + 'virtual', 'void', 'volatile', 'wchar_t', 'while', 'xor', 'xor_eq' + ] +} + +reserved['C++11'] = reserved['C++98'][:] + [ + 'alignas', 'alignof', 'char16_t', 'char32_t', 'constexpr', 'decltype', + 'noexcept', 'nullptr', 'static_assert', 'thread_local' +] +reserved['C++17'] = reserved['C++11'][:] +reserved['C++17'].remove('register') +# TM TS: atomic_cancel, atomic_commit, atomic_noexcept, synchronized +# concepts TS: concept, requires +# module TS: import, module + + +_math_functions = { + 'C++98': { + 'Mod': 'fmod', + 'ceiling': 'ceil', + }, + 'C++11': { + 'gamma': 'tgamma', + }, + 'C++17': { + 'beta': 'beta', + 'Ei': 'expint', + 'zeta': 'riemann_zeta', + } +} + +# from https://en.cppreference.com/w/cpp/header/cmath +for k in ('Abs', 'exp', 'log', 'log10', 'sqrt', 'sin', 'cos', 'tan', # 'Pow' + 'asin', 'acos', 'atan', 'atan2', 'sinh', 'cosh', 'tanh', 'floor'): + _math_functions['C++98'][k] = k.lower() + + +for k in ('asinh', 'acosh', 'atanh', 'erf', 'erfc'): + _math_functions['C++11'][k] = k.lower() + + +def _attach_print_method(cls, sympy_name, func_name): + meth_name = '_print_%s' % sympy_name + if hasattr(cls, meth_name): + raise ValueError("Edit method (or subclass) instead of overwriting.") + def _print_method(self, expr): + return '{}{}({})'.format(self._ns, func_name, ', '.join(map(self._print, expr.args))) + _print_method.__doc__ = "Prints code for %s" % k + setattr(cls, meth_name, _print_method) + + +def _attach_print_methods(cls, cont): + for sympy_name, cxx_name in cont[cls.standard].items(): + _attach_print_method(cls, sympy_name, cxx_name) + + +class _CXXCodePrinterBase: + printmethod = "_cxxcode" + language = 'C++' + _ns = 'std::' # namespace + + def __init__(self, settings=None): + super().__init__(settings or {}) + + @requires(headers={'algorithm'}) + def _print_Max(self, expr): + from sympy.functions.elementary.miscellaneous import Max + if len(expr.args) == 1: + return self._print(expr.args[0]) + return "%smax(%s, %s)" % (self._ns, self._print(expr.args[0]), + self._print(Max(*expr.args[1:]))) + + @requires(headers={'algorithm'}) + def _print_Min(self, expr): + from sympy.functions.elementary.miscellaneous import Min + if len(expr.args) == 1: + return self._print(expr.args[0]) + return "%smin(%s, %s)" % (self._ns, self._print(expr.args[0]), + self._print(Min(*expr.args[1:]))) + + def _print_using(self, expr): + if expr.alias == none: + return 'using %s' % expr.type + else: + raise ValueError("C++98 does not support type aliases") + + def _print_Raise(self, rs): + arg, = rs.args + return 'throw %s' % self._print(arg) + + @requires(headers={'stdexcept'}) + def _print_RuntimeError_(self, re): + message, = re.args + return "%sruntime_error(%s)" % (self._ns, self._print(message)) + + +class CXX98CodePrinter(_CXXCodePrinterBase, C89CodePrinter): + standard = 'C++98' + reserved_words = set(reserved['C++98']) + + +# _attach_print_methods(CXX98CodePrinter, _math_functions) + + +class CXX11CodePrinter(_CXXCodePrinterBase, C99CodePrinter): + standard = 'C++11' + reserved_words = set(reserved['C++11']) + type_mappings = dict(chain( + CXX98CodePrinter.type_mappings.items(), + { + Type('int8'): ('int8_t', {'cstdint'}), + Type('int16'): ('int16_t', {'cstdint'}), + Type('int32'): ('int32_t', {'cstdint'}), + Type('int64'): ('int64_t', {'cstdint'}), + Type('uint8'): ('uint8_t', {'cstdint'}), + Type('uint16'): ('uint16_t', {'cstdint'}), + Type('uint32'): ('uint32_t', {'cstdint'}), + Type('uint64'): ('uint64_t', {'cstdint'}), + Type('complex64'): ('std::complex', {'complex'}), + Type('complex128'): ('std::complex', {'complex'}), + Type('bool'): ('bool', None), + }.items() + )) + + def _print_using(self, expr): + if expr.alias == none: + return super()._print_using(expr) + else: + return 'using %(alias)s = %(type)s' % expr.kwargs(apply=self._print) + +# _attach_print_methods(CXX11CodePrinter, _math_functions) + + +class CXX17CodePrinter(_CXXCodePrinterBase, C99CodePrinter): + standard = 'C++17' + reserved_words = set(reserved['C++17']) + + _kf = dict(C99CodePrinter._kf, **_math_functions['C++17']) + + def _print_beta(self, expr): + return self._print_math_func(expr) + + def _print_Ei(self, expr): + return self._print_math_func(expr) + + def _print_zeta(self, expr): + return self._print_math_func(expr) + + +# _attach_print_methods(CXX17CodePrinter, _math_functions) + +cxx_code_printers = { + 'c++98': CXX98CodePrinter, + 'c++11': CXX11CodePrinter, + 'c++17': CXX17CodePrinter +} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/defaults.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/defaults.py new file mode 100644 index 0000000000000000000000000000000000000000..77a88d353fed4bd70496456ddd03cc429a4ba5e7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/defaults.py @@ -0,0 +1,5 @@ +from sympy.core._print_helpers import Printable + +# alias for compatibility +Printable.__module__ = __name__ +DefaultPrinting = Printable diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/dot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/dot.py new file mode 100644 index 0000000000000000000000000000000000000000..c968fee389c16108b757b8fcad531ac6fa4ddb2f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/dot.py @@ -0,0 +1,294 @@ +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.symbol import Symbol +from sympy.core.numbers import Integer, Rational, Float +from sympy.printing.repr import srepr + +__all__ = ['dotprint'] + +default_styles = ( + (Basic, {'color': 'blue', 'shape': 'ellipse'}), + (Expr, {'color': 'black'}) +) + +slotClasses = (Symbol, Integer, Rational, Float) +def purestr(x, with_args=False): + """A string that follows ```obj = type(obj)(*obj.args)``` exactly. + + Parameters + ========== + + with_args : boolean, optional + If ``True``, there will be a second argument for the return + value, which is a tuple containing ``purestr`` applied to each + of the subnodes. + + If ``False``, there will not be a second argument for the + return. + + Default is ``False`` + + Examples + ======== + + >>> from sympy import Float, Symbol, MatrixSymbol + >>> from sympy import Integer # noqa: F401 + >>> from sympy.core.symbol import Str # noqa: F401 + >>> from sympy.printing.dot import purestr + + Applying ``purestr`` for basic symbolic object: + >>> code = purestr(Symbol('x')) + >>> code + "Symbol('x')" + >>> eval(code) == Symbol('x') + True + + For basic numeric object: + >>> purestr(Float(2)) + "Float('2.0', precision=53)" + + For matrix symbol: + >>> code = purestr(MatrixSymbol('x', 2, 2)) + >>> code + "MatrixSymbol(Str('x'), Integer(2), Integer(2))" + >>> eval(code) == MatrixSymbol('x', 2, 2) + True + + With ``with_args=True``: + >>> purestr(Float(2), with_args=True) + ("Float('2.0', precision=53)", ()) + >>> purestr(MatrixSymbol('x', 2, 2), with_args=True) + ("MatrixSymbol(Str('x'), Integer(2), Integer(2))", + ("Str('x')", 'Integer(2)', 'Integer(2)')) + """ + sargs = () + if not isinstance(x, Basic): + rv = str(x) + elif not x.args: + rv = srepr(x) + else: + args = x.args + sargs = tuple(map(purestr, args)) + rv = "%s(%s)"%(type(x).__name__, ', '.join(sargs)) + if with_args: + rv = rv, sargs + return rv + + +def styleof(expr, styles=default_styles): + """ Merge style dictionaries in order + + Examples + ======== + + >>> from sympy import Symbol, Basic, Expr, S + >>> from sympy.printing.dot import styleof + >>> styles = [(Basic, {'color': 'blue', 'shape': 'ellipse'}), + ... (Expr, {'color': 'black'})] + + >>> styleof(Basic(S(1)), styles) + {'color': 'blue', 'shape': 'ellipse'} + + >>> x = Symbol('x') + >>> styleof(x + 1, styles) # this is an Expr + {'color': 'black', 'shape': 'ellipse'} + """ + style = {} + for typ, sty in styles: + if isinstance(expr, typ): + style.update(sty) + return style + + +def attrprint(d, delimiter=', '): + """ Print a dictionary of attributes + + Examples + ======== + + >>> from sympy.printing.dot import attrprint + >>> print(attrprint({'color': 'blue', 'shape': 'ellipse'})) + "color"="blue", "shape"="ellipse" + """ + return delimiter.join('"%s"="%s"'%item for item in sorted(d.items())) + + +def dotnode(expr, styles=default_styles, labelfunc=str, pos=(), repeat=True): + """ String defining a node + + Examples + ======== + + >>> from sympy.printing.dot import dotnode + >>> from sympy.abc import x + >>> print(dotnode(x)) + "Symbol('x')_()" ["color"="black", "label"="x", "shape"="ellipse"]; + """ + style = styleof(expr, styles) + + if isinstance(expr, Basic) and not expr.is_Atom: + label = str(expr.__class__.__name__) + else: + label = labelfunc(expr) + style['label'] = label + expr_str = purestr(expr) + if repeat: + expr_str += '_%s' % str(pos) + return '"%s" [%s];' % (expr_str, attrprint(style)) + + +def dotedges(expr, atom=lambda x: not isinstance(x, Basic), pos=(), repeat=True): + """ List of strings for all expr->expr.arg pairs + + See the docstring of dotprint for explanations of the options. + + Examples + ======== + + >>> from sympy.printing.dot import dotedges + >>> from sympy.abc import x + >>> for e in dotedges(x+2): + ... print(e) + "Add(Integer(2), Symbol('x'))_()" -> "Integer(2)_(0,)"; + "Add(Integer(2), Symbol('x'))_()" -> "Symbol('x')_(1,)"; + """ + if atom(expr): + return [] + else: + expr_str, arg_strs = purestr(expr, with_args=True) + if repeat: + expr_str += '_%s' % str(pos) + arg_strs = ['%s_%s' % (a, str(pos + (i,))) + for i, a in enumerate(arg_strs)] + return ['"%s" -> "%s";' % (expr_str, a) for a in arg_strs] + +template = \ +"""digraph{ + +# Graph style +%(graphstyle)s + +######### +# Nodes # +######### + +%(nodes)s + +######### +# Edges # +######### + +%(edges)s +}""" + +_graphstyle = {'rankdir': 'TD', 'ordering': 'out'} + +def dotprint(expr, + styles=default_styles, atom=lambda x: not isinstance(x, Basic), + maxdepth=None, repeat=True, labelfunc=str, **kwargs): + """DOT description of a SymPy expression tree + + Parameters + ========== + + styles : list of lists composed of (Class, mapping), optional + Styles for different classes. + + The default is + + .. code-block:: python + + ( + (Basic, {'color': 'blue', 'shape': 'ellipse'}), + (Expr, {'color': 'black'}) + ) + + atom : function, optional + Function used to determine if an arg is an atom. + + A good choice is ``lambda x: not x.args``. + + The default is ``lambda x: not isinstance(x, Basic)``. + + maxdepth : integer, optional + The maximum depth. + + The default is ``None``, meaning no limit. + + repeat : boolean, optional + Whether to use different nodes for common subexpressions. + + The default is ``True``. + + For example, for ``x + x*y`` with ``repeat=True``, it will have + two nodes for ``x``; with ``repeat=False``, it will have one + node. + + .. warning:: + Even if a node appears twice in the same object like ``x`` in + ``Pow(x, x)``, it will still only appear once. + Hence, with ``repeat=False``, the number of arrows out of an + object might not equal the number of args it has. + + labelfunc : function, optional + A function to create a label for a given leaf node. + + The default is ``str``. + + Another good option is ``srepr``. + + For example with ``str``, the leaf nodes of ``x + 1`` are labeled, + ``x`` and ``1``. With ``srepr``, they are labeled ``Symbol('x')`` + and ``Integer(1)``. + + **kwargs : optional + Additional keyword arguments are included as styles for the graph. + + Examples + ======== + + >>> from sympy import dotprint + >>> from sympy.abc import x + >>> print(dotprint(x+2)) # doctest: +NORMALIZE_WHITESPACE + digraph{ + + # Graph style + "ordering"="out" + "rankdir"="TD" + + ######### + # Nodes # + ######### + + "Add(Integer(2), Symbol('x'))_()" ["color"="black", "label"="Add", "shape"="ellipse"]; + "Integer(2)_(0,)" ["color"="black", "label"="2", "shape"="ellipse"]; + "Symbol('x')_(1,)" ["color"="black", "label"="x", "shape"="ellipse"]; + + ######### + # Edges # + ######### + + "Add(Integer(2), Symbol('x'))_()" -> "Integer(2)_(0,)"; + "Add(Integer(2), Symbol('x'))_()" -> "Symbol('x')_(1,)"; + } + + """ + # repeat works by adding a signature tuple to the end of each node for its + # position in the graph. For example, for expr = Add(x, Pow(x, 2)), the x in the + # Pow will have the tuple (1, 0), meaning it is expr.args[1].args[0]. + graphstyle = _graphstyle.copy() + graphstyle.update(kwargs) + + nodes = [] + edges = [] + def traverse(e, depth, pos=()): + nodes.append(dotnode(e, styles, labelfunc=labelfunc, pos=pos, repeat=repeat)) + if maxdepth and depth >= maxdepth: + return + edges.extend(dotedges(e, atom=atom, pos=pos, repeat=repeat)) + [traverse(arg, depth+1, pos + (i,)) for i, arg in enumerate(e.args) if not atom(arg)] + traverse(expr, 0) + + return template%{'graphstyle': attrprint(graphstyle, delimiter='\n'), + 'nodes': '\n'.join(nodes), + 'edges': '\n'.join(edges)} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/fortran.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/fortran.py new file mode 100644 index 0000000000000000000000000000000000000000..7cea812d72ddcd3ccb56c7258f74e6fe3b8d5211 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/fortran.py @@ -0,0 +1,779 @@ +""" +Fortran code printer + +The FCodePrinter converts single SymPy expressions into single Fortran +expressions, using the functions defined in the Fortran 77 standard where +possible. Some useful pointers to Fortran can be found on wikipedia: + +https://en.wikipedia.org/wiki/Fortran + +Most of the code below is based on the "Professional Programmer\'s Guide to +Fortran77" by Clive G. Page: + +https://www.star.le.ac.uk/~cgp/prof77.html + +Fortran is a case-insensitive language. This might cause trouble because +SymPy is case sensitive. So, fcode adds underscores to variable names when +it is necessary to make them different for Fortran. +""" + +from __future__ import annotations +from typing import Any + +from collections import defaultdict +from itertools import chain +import string + +from sympy.codegen.ast import ( + Assignment, Declaration, Pointer, value_const, + float32, float64, float80, complex64, complex128, int8, int16, int32, + int64, intc, real, integer, bool_, complex_, none, stderr, stdout +) +from sympy.codegen.fnodes import ( + allocatable, isign, dsign, cmplx, merge, literal_dp, elemental, pure, + intent_in, intent_out, intent_inout +) +from sympy.core import S, Add, N, Float, Symbol +from sympy.core.function import Function +from sympy.core.numbers import equal_valued +from sympy.core.relational import Eq +from sympy.sets import Range +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE +from sympy.printing.printer import printer_context + +# These are defined in the other file so we can avoid importing sympy.codegen +# from the top-level 'import sympy'. Export them here as well. +from sympy.printing.codeprinter import fcode, print_fcode # noqa:F401 + +known_functions = { + "sin": "sin", + "cos": "cos", + "tan": "tan", + "asin": "asin", + "acos": "acos", + "atan": "atan", + "atan2": "atan2", + "sinh": "sinh", + "cosh": "cosh", + "tanh": "tanh", + "log": "log", + "exp": "exp", + "erf": "erf", + "Abs": "abs", + "conjugate": "conjg", + "Max": "max", + "Min": "min", +} + + +class FCodePrinter(CodePrinter): + """A printer to convert SymPy expressions to strings of Fortran code""" + printmethod = "_fcode" + language = "Fortran" + + type_aliases = { + integer: int32, + real: float64, + complex_: complex128, + } + + type_mappings = { + intc: 'integer(c_int)', + float32: 'real*4', # real(kind(0.e0)) + float64: 'real*8', # real(kind(0.d0)) + float80: 'real*10', # real(kind(????)) + complex64: 'complex*8', + complex128: 'complex*16', + int8: 'integer*1', + int16: 'integer*2', + int32: 'integer*4', + int64: 'integer*8', + bool_: 'logical' + } + + type_modules = { + intc: {'iso_c_binding': 'c_int'} + } + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'source_format': 'fixed', + 'contract': True, + 'standard': 77, + 'name_mangling': True, + }) + + _operators = { + 'and': '.and.', + 'or': '.or.', + 'xor': '.neqv.', + 'equivalent': '.eqv.', + 'not': '.not. ', + } + + _relationals = { + '!=': '/=', + } + + def __init__(self, settings=None): + if not settings: + settings = {} + self.mangled_symbols = {} # Dict showing mapping of all words + self.used_name = [] + self.type_aliases = dict(chain(self.type_aliases.items(), + settings.pop('type_aliases', {}).items())) + self.type_mappings = dict(chain(self.type_mappings.items(), + settings.pop('type_mappings', {}).items())) + super().__init__(settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + # leading columns depend on fixed or free format + standards = {66, 77, 90, 95, 2003, 2008} + if self._settings['standard'] not in standards: + raise ValueError("Unknown Fortran standard: %s" % self._settings[ + 'standard']) + self.module_uses = defaultdict(set) # e.g.: use iso_c_binding, only: c_int + + @property + def _lead(self): + if self._settings['source_format'] == 'fixed': + return {'code': " ", 'cont': " @ ", 'comment': "C "} + elif self._settings['source_format'] == 'free': + return {'code': "", 'cont': " ", 'comment': "! "} + else: + raise ValueError("Unknown source format: %s" % self._settings['source_format']) + + def _print_Symbol(self, expr): + if self._settings['name_mangling'] == True: + if expr not in self.mangled_symbols: + name = expr.name + while name.lower() in self.used_name: + name += '_' + self.used_name.append(name.lower()) + if name == expr.name: + self.mangled_symbols[expr] = expr + else: + self.mangled_symbols[expr] = Symbol(name) + + expr = expr.xreplace(self.mangled_symbols) + + name = super()._print_Symbol(expr) + return name + + def _rate_index_position(self, p): + return -p*5 + + def _get_statement(self, codestring): + return codestring + + def _get_comment(self, text): + return "! {}".format(text) + + def _declare_number_const(self, name, value): + return "parameter ({} = {})".format(name, self._print(value)) + + def _print_NumberSymbol(self, expr): + # A Number symbol that is not implemented here or with _printmethod + # is registered and evaluated + self._number_symbols.add((expr, Float(expr.evalf(self._settings['precision'])))) + return str(expr) + + def _format_code(self, lines): + return self._wrap_fortran(self.indent_code(lines)) + + def _traverse_matrix_indices(self, mat): + rows, cols = mat.shape + return ((i, j) for j in range(cols) for i in range(rows)) + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + for i in indices: + # fortran arrays start at 1 and end at dimension + var, start, stop = map(self._print, + [i.label, i.lower + 1, i.upper + 1]) + open_lines.append("do %s = %s, %s" % (var, start, stop)) + close_lines.append("end do") + return open_lines, close_lines + + def _print_sign(self, expr): + from sympy.functions.elementary.complexes import Abs + arg, = expr.args + if arg.is_integer: + new_expr = merge(0, isign(1, arg), Eq(arg, 0)) + elif (arg.is_complex or arg.is_infinite): + new_expr = merge(cmplx(literal_dp(0), literal_dp(0)), arg/Abs(arg), Eq(Abs(arg), literal_dp(0))) + else: + new_expr = merge(literal_dp(0), dsign(literal_dp(1), arg), Eq(arg, literal_dp(0))) + return self._print(new_expr) + + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if expr.has(Assignment): + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s) then" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else") + else: + lines.append("else if (%s) then" % self._print(c)) + lines.append(self._print(e)) + lines.append("end if") + return "\n".join(lines) + elif self._settings["standard"] >= 95: + # Only supported in F95 and newer: + # The piecewise was used in an expression, need to do inline + # operators. This has the downside that inline operators will + # not work for statements that span multiple lines (Matrix or + # Indexed expressions). + pattern = "merge({T}, {F}, {COND})" + code = self._print(expr.args[-1].expr) + terms = list(expr.args[:-1]) + while terms: + e, c = terms.pop() + expr = self._print(e) + cond = self._print(c) + code = pattern.format(T=expr, F=code, COND=cond) + return code + else: + # `merge` is not supported prior to F95 + raise NotImplementedError("Using Piecewise as an expression using " + "inline operators is not supported in " + "standards earlier than Fortran95.") + + def _print_MatrixElement(self, expr): + return "{}({}, {})".format(self.parenthesize(expr.parent, + PRECEDENCE["Atom"], strict=True), expr.i + 1, expr.j + 1) + + def _print_Add(self, expr): + # purpose: print complex numbers nicely in Fortran. + # collect the purely real and purely imaginary parts: + pure_real = [] + pure_imaginary = [] + mixed = [] + for arg in expr.args: + if arg.is_number and arg.is_real: + pure_real.append(arg) + elif arg.is_number and arg.is_imaginary: + pure_imaginary.append(arg) + else: + mixed.append(arg) + if pure_imaginary: + if mixed: + PREC = precedence(expr) + term = Add(*mixed) + t = self._print(term) + if t.startswith('-'): + sign = "-" + t = t[1:] + else: + sign = "+" + if precedence(term) < PREC: + t = "(%s)" % t + + return "cmplx(%s,%s) %s %s" % ( + self._print(Add(*pure_real)), + self._print(-S.ImaginaryUnit*Add(*pure_imaginary)), + sign, t, + ) + else: + return "cmplx(%s,%s)" % ( + self._print(Add(*pure_real)), + self._print(-S.ImaginaryUnit*Add(*pure_imaginary)), + ) + else: + return CodePrinter._print_Add(self, expr) + + def _print_Function(self, expr): + # All constant function args are evaluated as floats + prec = self._settings['precision'] + args = [N(a, prec) for a in expr.args] + eval_expr = expr.func(*args) + if not isinstance(eval_expr, Function): + return self._print(eval_expr) + else: + return CodePrinter._print_Function(self, expr.func(*args)) + + def _print_Mod(self, expr): + # NOTE : Fortran has the functions mod() and modulo(). modulo() behaves + # the same wrt to the sign of the arguments as Python and SymPy's + # modulus computations (% and Mod()) but is not available in Fortran 66 + # or Fortran 77, thus we raise an error. + if self._settings['standard'] in [66, 77]: + msg = ("Python % operator and SymPy's Mod() function are not " + "supported by Fortran 66 or 77 standards.") + raise NotImplementedError(msg) + else: + x, y = expr.args + return " modulo({}, {})".format(self._print(x), self._print(y)) + + def _print_ImaginaryUnit(self, expr): + # purpose: print complex numbers nicely in Fortran. + return "cmplx(0,1)" + + def _print_int(self, expr): + return str(expr) + + def _print_Mul(self, expr): + # purpose: print complex numbers nicely in Fortran. + if expr.is_number and expr.is_imaginary: + return "cmplx(0,%s)" % ( + self._print(-S.ImaginaryUnit*expr) + ) + else: + return CodePrinter._print_Mul(self, expr) + + def _print_Pow(self, expr): + PREC = precedence(expr) + if equal_valued(expr.exp, -1): + return '%s/%s' % ( + self._print(literal_dp(1)), + self.parenthesize(expr.base, PREC) + ) + elif equal_valued(expr.exp, 0.5): + if expr.base.is_integer: + # Fortran intrinsic sqrt() does not accept integer argument + if expr.base.is_Number: + return 'sqrt(%s.0d0)' % self._print(expr.base) + else: + return 'sqrt(dble(%s))' % self._print(expr.base) + else: + return 'sqrt(%s)' % self._print(expr.base) + else: + return CodePrinter._print_Pow(self, expr) + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + return "%d.0d0/%d.0d0" % (p, q) + + def _print_Float(self, expr): + printed = CodePrinter._print_Float(self, expr) + e = printed.find('e') + if e > -1: + return "%sd%s" % (printed[:e], printed[e + 1:]) + return "%sd0" % printed + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + op = op if op not in self._relationals else self._relationals[op] + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Indexed(self, expr): + inds = [ self._print(i) for i in expr.indices ] + return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) + + def _print_AugmentedAssignment(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + return self._get_statement("{0} = {0} {1} {2}".format( + self._print(lhs_code), self._print(expr.binop), self._print(rhs_code))) + + def _print_sum_(self, sm): + params = self._print(sm.array) + if sm.dim != None: # Must use '!= None', cannot use 'is not None' + params += ', ' + self._print(sm.dim) + if sm.mask != None: # Must use '!= None', cannot use 'is not None' + params += ', mask=' + self._print(sm.mask) + return '%s(%s)' % (sm.__class__.__name__.rstrip('_'), params) + + def _print_product_(self, prod): + return self._print_sum_(prod) + + def _print_Do(self, do): + excl = ['concurrent'] + if do.step == 1: + excl.append('step') + step = '' + else: + step = ', {step}' + + return ( + 'do {concurrent}{counter} = {first}, {last}'+step+'\n' + '{body}\n' + 'end do\n' + ).format( + concurrent='concurrent ' if do.concurrent else '', + **do.kwargs(apply=lambda arg: self._print(arg), exclude=excl) + ) + + def _print_ImpliedDoLoop(self, idl): + step = '' if idl.step == 1 else ', {step}' + return ('({expr}, {counter} = {first}, {last}'+step+')').format( + **idl.kwargs(apply=lambda arg: self._print(arg)) + ) + + def _print_For(self, expr): + target = self._print(expr.target) + if isinstance(expr.iterable, Range): + start, stop, step = expr.iterable.args + else: + raise NotImplementedError("Only iterable currently supported is Range") + body = self._print(expr.body) + return ('do {target} = {start}, {stop}, {step}\n' + '{body}\n' + 'end do').format(target=target, start=start, stop=stop - 1, + step=step, body=body) + + def _print_Type(self, type_): + type_ = self.type_aliases.get(type_, type_) + type_str = self.type_mappings.get(type_, type_.name) + module_uses = self.type_modules.get(type_) + if module_uses: + for k, v in module_uses: + self.module_uses[k].add(v) + return type_str + + def _print_Element(self, elem): + return '{symbol}({idxs})'.format( + symbol=self._print(elem.symbol), + idxs=', '.join((self._print(arg) for arg in elem.indices)) + ) + + def _print_Extent(self, ext): + return str(ext) + + def _print_Declaration(self, expr): + var = expr.variable + val = var.value + dim = var.attr_params('dimension') + intents = [intent in var.attrs for intent in (intent_in, intent_out, intent_inout)] + if intents.count(True) == 0: + intent = '' + elif intents.count(True) == 1: + intent = ', intent(%s)' % ['in', 'out', 'inout'][intents.index(True)] + else: + raise ValueError("Multiple intents specified for %s" % self) + + if isinstance(var, Pointer): + raise NotImplementedError("Pointers are not available by default in Fortran.") + if self._settings["standard"] >= 90: + result = '{t}{vc}{dim}{intent}{alloc} :: {s}'.format( + t=self._print(var.type), + vc=', parameter' if value_const in var.attrs else '', + dim=', dimension(%s)' % ', '.join((self._print(arg) for arg in dim)) if dim else '', + intent=intent, + alloc=', allocatable' if allocatable in var.attrs else '', + s=self._print(var.symbol) + ) + if val != None: # Must be "!= None", cannot be "is not None" + result += ' = %s' % self._print(val) + else: + if value_const in var.attrs or val: + raise NotImplementedError("F77 init./parameter statem. req. multiple lines.") + result = ' '.join((self._print(arg) for arg in [var.type, var.symbol])) + + return result + + + def _print_Infinity(self, expr): + return '(huge(%s) + 1)' % self._print(literal_dp(0)) + + def _print_While(self, expr): + return 'do while ({condition})\n{body}\nend do'.format(**expr.kwargs( + apply=lambda arg: self._print(arg))) + + def _print_BooleanTrue(self, expr): + return '.true.' + + def _print_BooleanFalse(self, expr): + return '.false.' + + def _pad_leading_columns(self, lines): + result = [] + for line in lines: + if line.startswith('!'): + result.append(self._lead['comment'] + line[1:].lstrip()) + else: + result.append(self._lead['code'] + line) + return result + + def _wrap_fortran(self, lines): + """Wrap long Fortran lines + + Argument: + lines -- a list of lines (without \\n character) + + A comment line is split at white space. Code lines are split with a more + complex rule to give nice results. + """ + # routine to find split point in a code line + my_alnum = set("_+-." + string.digits + string.ascii_letters) + my_white = set(" \t()") + + def split_pos_code(line, endpos): + if len(line) <= endpos: + return len(line) + pos = endpos + split = lambda pos: \ + (line[pos] in my_alnum and line[pos - 1] not in my_alnum) or \ + (line[pos] not in my_alnum and line[pos - 1] in my_alnum) or \ + (line[pos] in my_white and line[pos - 1] not in my_white) or \ + (line[pos] not in my_white and line[pos - 1] in my_white) + while not split(pos): + pos -= 1 + if pos == 0: + return endpos + return pos + # split line by line and add the split lines to result + result = [] + if self._settings['source_format'] == 'free': + trailing = ' &' + else: + trailing = '' + for line in lines: + if line.startswith(self._lead['comment']): + # comment line + if len(line) > 72: + pos = line.rfind(" ", 6, 72) + if pos == -1: + pos = 72 + hunk = line[:pos] + line = line[pos:].lstrip() + result.append(hunk) + while line: + pos = line.rfind(" ", 0, 66) + if pos == -1 or len(line) < 66: + pos = 66 + hunk = line[:pos] + line = line[pos:].lstrip() + result.append("%s%s" % (self._lead['comment'], hunk)) + else: + result.append(line) + elif line.startswith(self._lead['code']): + # code line + pos = split_pos_code(line, 72) + hunk = line[:pos].rstrip() + line = line[pos:].lstrip() + if line: + hunk += trailing + result.append(hunk) + while line: + pos = split_pos_code(line, 65) + hunk = line[:pos].rstrip() + line = line[pos:].lstrip() + if line: + hunk += trailing + result.append("%s%s" % (self._lead['cont'], hunk)) + else: + result.append(line) + return result + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + free = self._settings['source_format'] == 'free' + code = [ line.lstrip(' \t') for line in code ] + + inc_keyword = ('do ', 'if(', 'if ', 'do\n', 'else', 'program', 'interface') + dec_keyword = ('end do', 'enddo', 'end if', 'endif', 'else', 'end program', 'end interface') + + increase = [ int(any(map(line.startswith, inc_keyword))) + for line in code ] + decrease = [ int(any(map(line.startswith, dec_keyword))) + for line in code ] + continuation = [ int(any(map(line.endswith, ['&', '&\n']))) + for line in code ] + + level = 0 + cont_padding = 0 + tabwidth = 3 + new_code = [] + for i, line in enumerate(code): + if line in ('', '\n'): + new_code.append(line) + continue + level -= decrease[i] + + if free: + padding = " "*(level*tabwidth + cont_padding) + else: + padding = " "*level*tabwidth + + line = "%s%s" % (padding, line) + if not free: + line = self._pad_leading_columns([line])[0] + + new_code.append(line) + + if continuation[i]: + cont_padding = 2*tabwidth + else: + cont_padding = 0 + level += increase[i] + + if not free: + return self._wrap_fortran(new_code) + return new_code + + def _print_GoTo(self, goto): + if goto.expr: # computed goto + return "go to ({labels}), {expr}".format( + labels=', '.join((self._print(arg) for arg in goto.labels)), + expr=self._print(goto.expr) + ) + else: + lbl, = goto.labels + return "go to %s" % self._print(lbl) + + def _print_Program(self, prog): + return ( + "program {name}\n" + "{body}\n" + "end program\n" + ).format(**prog.kwargs(apply=lambda arg: self._print(arg))) + + def _print_Module(self, mod): + return ( + "module {name}\n" + "{declarations}\n" + "\ncontains\n\n" + "{definitions}\n" + "end module\n" + ).format(**mod.kwargs(apply=lambda arg: self._print(arg))) + + def _print_Stream(self, strm): + if strm.name == 'stdout' and self._settings["standard"] >= 2003: + self.module_uses['iso_c_binding'].add('stdint=>input_unit') + return 'input_unit' + elif strm.name == 'stderr' and self._settings["standard"] >= 2003: + self.module_uses['iso_c_binding'].add('stdint=>error_unit') + return 'error_unit' + else: + if strm.name == 'stdout': + return '*' + else: + return strm.name + + def _print_Print(self, ps): + if ps.format_string == none: # Must be '!= None', cannot be 'is not None' + template = "print {fmt}, {iolist}" + fmt = '*' + else: + template = 'write(%(out)s, fmt="{fmt}", advance="no"), {iolist}' % { + 'out': {stderr: '0', stdout: '6'}.get(ps.file, '*') + } + fmt = self._print(ps.format_string) + return template.format(fmt=fmt, iolist=', '.join( + (self._print(arg) for arg in ps.print_args))) + + def _print_Return(self, rs): + arg, = rs.args + return "{result_name} = {arg}".format( + result_name=self._context.get('result_name', 'sympy_result'), + arg=self._print(arg) + ) + + def _print_FortranReturn(self, frs): + arg, = frs.args + if arg: + return 'return %s' % self._print(arg) + else: + return 'return' + + def _head(self, entity, fp, **kwargs): + bind_C_params = fp.attr_params('bind_C') + if bind_C_params is None: + bind = '' + else: + bind = ' bind(C, name="%s")' % bind_C_params[0] if bind_C_params else ' bind(C)' + result_name = self._settings.get('result_name', None) + return ( + "{entity}{name}({arg_names}){result}{bind}\n" + "{arg_declarations}" + ).format( + entity=entity, + name=self._print(fp.name), + arg_names=', '.join([self._print(arg.symbol) for arg in fp.parameters]), + result=(' result(%s)' % result_name) if result_name else '', + bind=bind, + arg_declarations='\n'.join((self._print(Declaration(arg)) for arg in fp.parameters)) + ) + + def _print_FunctionPrototype(self, fp): + entity = "{} function ".format(self._print(fp.return_type)) + return ( + "interface\n" + "{function_head}\n" + "end function\n" + "end interface" + ).format(function_head=self._head(entity, fp)) + + def _print_FunctionDefinition(self, fd): + if elemental in fd.attrs: + prefix = 'elemental ' + elif pure in fd.attrs: + prefix = 'pure ' + else: + prefix = '' + + entity = "{} function ".format(self._print(fd.return_type)) + with printer_context(self, result_name=fd.name): + return ( + "{prefix}{function_head}\n" + "{body}\n" + "end function\n" + ).format( + prefix=prefix, + function_head=self._head(entity, fd), + body=self._print(fd.body) + ) + + def _print_Subroutine(self, sub): + return ( + '{subroutine_head}\n' + '{body}\n' + 'end subroutine\n' + ).format( + subroutine_head=self._head('subroutine ', sub), + body=self._print(sub.body) + ) + + def _print_SubroutineCall(self, scall): + return 'call {name}({args})'.format( + name=self._print(scall.name), + args=', '.join((self._print(arg) for arg in scall.subroutine_args)) + ) + + def _print_use_rename(self, rnm): + return "%s => %s" % tuple((self._print(arg) for arg in rnm.args)) + + def _print_use(self, use): + result = 'use %s' % self._print(use.namespace) + if use.rename != None: # Must be '!= None', cannot be 'is not None' + result += ', ' + ', '.join([self._print(rnm) for rnm in use.rename]) + if use.only != None: # Must be '!= None', cannot be 'is not None' + result += ', only: ' + ', '.join([self._print(nly) for nly in use.only]) + return result + + def _print_BreakToken(self, _): + return 'exit' + + def _print_ContinueToken(self, _): + return 'cycle' + + def _print_ArrayConstructor(self, ac): + fmtstr = "[%s]" if self._settings["standard"] >= 2003 else '(/%s/)' + return fmtstr % ', '.join((self._print(arg) for arg in ac.elements)) + + def _print_ArrayElement(self, elem): + return '{symbol}({idxs})'.format( + symbol=self._print(elem.name), + idxs=', '.join((self._print(arg) for arg in elem.indices)) + ) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/glsl.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/glsl.py new file mode 100644 index 0000000000000000000000000000000000000000..f98df8d46abec5f891b6bc9836a13ca69934275c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/glsl.py @@ -0,0 +1,548 @@ +from __future__ import annotations + +from sympy.core import Basic, S +from sympy.core.function import Lambda +from sympy.core.numbers import equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence +from functools import reduce + +known_functions = { + 'Abs': 'abs', + 'sin': 'sin', + 'cos': 'cos', + 'tan': 'tan', + 'acos': 'acos', + 'asin': 'asin', + 'atan': 'atan', + 'atan2': 'atan', + 'ceiling': 'ceil', + 'floor': 'floor', + 'sign': 'sign', + 'exp': 'exp', + 'log': 'log', + 'add': 'add', + 'sub': 'sub', + 'mul': 'mul', + 'pow': 'pow' +} + +class GLSLPrinter(CodePrinter): + """ + Rudimentary, generic GLSL printing tools. + + Additional settings: + 'use_operators': Boolean (should the printer use operators for +,-,*, or functions?) + """ + _not_supported: set[Basic] = set() + printmethod = "_glsl" + language = "GLSL" + + _default_settings = dict(CodePrinter._default_settings, **{ + 'use_operators': True, + 'zero': 0, + 'mat_nested': False, + 'mat_separator': ',\n', + 'mat_transpose': False, + 'array_type': 'float', + 'glsl_types': True, + + 'precision': 9, + 'user_functions': {}, + 'contract': True, + }) + + def __init__(self, settings={}): + CodePrinter.__init__(self, settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + + def _rate_index_position(self, p): + return p*5 + + def _get_statement(self, codestring): + return "%s;" % codestring + + def _get_comment(self, text): + return "// {}".format(text) + + def _declare_number_const(self, name, value): + return "float {} = {};".format(name, value) + + def _format_code(self, lines): + return self.indent_code(lines) + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_token = ('{', '(', '{\n', '(\n') + dec_token = ('}', ')') + + code = [line.lstrip(' \t') for line in code] + + increase = [int(any(map(line.endswith, inc_token))) for line in code] + decrease = [int(any(map(line.startswith, dec_token))) for line in code] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + def _print_MatrixBase(self, mat): + mat_separator = self._settings['mat_separator'] + mat_transpose = self._settings['mat_transpose'] + column_vector = (mat.rows == 1) if mat_transpose else (mat.cols == 1) + A = mat.transpose() if mat_transpose != column_vector else mat + + glsl_types = self._settings['glsl_types'] + array_type = self._settings['array_type'] + array_size = A.cols*A.rows + array_constructor = "{}[{}]".format(array_type, array_size) + + if A.cols == 1: + return self._print(A[0]) + if A.rows <= 4 and A.cols <= 4 and glsl_types: + if A.rows == 1: + return "vec{}{}".format( + A.cols, A.table(self,rowstart='(',rowend=')') + ) + elif A.rows == A.cols: + return "mat{}({})".format( + A.rows, A.table(self,rowsep=', ', + rowstart='',rowend='') + ) + else: + return "mat{}x{}({})".format( + A.cols, A.rows, + A.table(self,rowsep=', ', + rowstart='',rowend='') + ) + elif S.One in A.shape: + return "{}({})".format( + array_constructor, + A.table(self,rowsep=mat_separator,rowstart='',rowend='') + ) + elif not self._settings['mat_nested']: + return "{}(\n{}\n) /* a {}x{} matrix */".format( + array_constructor, + A.table(self,rowsep=mat_separator,rowstart='',rowend=''), + A.rows, A.cols + ) + elif self._settings['mat_nested']: + return "{}[{}][{}](\n{}\n)".format( + array_type, A.rows, A.cols, + A.table(self,rowsep=mat_separator,rowstart='float[](',rowend=')') + ) + + def _print_SparseRepMatrix(self, mat): + # do not allow sparse matrices to be made dense + return self._print_not_supported(mat) + + def _traverse_matrix_indices(self, mat): + mat_transpose = self._settings['mat_transpose'] + if mat_transpose: + rows,cols = mat.shape + else: + cols,rows = mat.shape + return ((i, j) for i in range(cols) for j in range(rows)) + + def _print_MatrixElement(self, expr): + # print('begin _print_MatrixElement') + nest = self._settings['mat_nested'] + glsl_types = self._settings['glsl_types'] + mat_transpose = self._settings['mat_transpose'] + if mat_transpose: + cols,rows = expr.parent.shape + i,j = expr.j,expr.i + else: + rows,cols = expr.parent.shape + i,j = expr.i,expr.j + pnt = self._print(expr.parent) + if glsl_types and ((rows <= 4 and cols <=4) or nest): + return "{}[{}][{}]".format(pnt, i, j) + else: + return "{}[{}]".format(pnt, i + j*rows) + + def _print_list(self, expr): + l = ', '.join(self._print(item) for item in expr) + glsl_types = self._settings['glsl_types'] + array_type = self._settings['array_type'] + array_size = len(expr) + array_constructor = '{}[{}]'.format(array_type, array_size) + + if array_size <= 4 and glsl_types: + return 'vec{}({})'.format(array_size, l) + else: + return '{}({})'.format(array_constructor, l) + + _print_tuple = _print_list + _print_Tuple = _print_list + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + loopstart = "for (int %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" + for i in indices: + # GLSL arrays start at 0 and end at dimension-1 + open_lines.append(loopstart % { + 'varble': self._print(i.label), + 'start': self._print(i.lower), + 'end': self._print(i.upper + 1)}) + close_lines.append("}") + return open_lines, close_lines + + def _print_Function_with_args(self, func, func_args): + if func in self.known_functions: + cond_func = self.known_functions[func] + func = None + if isinstance(cond_func, str): + func = cond_func + else: + for cond, func in cond_func: + if cond(func_args): + break + if func is not None: + try: + return func(*[self.parenthesize(item, 0) for item in func_args]) + except TypeError: + return '{}({})'.format(func, self.stringify(func_args, ", ")) + elif isinstance(func, Lambda): + # inlined function + return self._print(func(*func_args)) + else: + return self._print_not_supported(func) + + def _print_Piecewise(self, expr): + from sympy.codegen.ast import Assignment + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if expr.has(Assignment): + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s) {" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else {") + else: + lines.append("else if (%s) {" % self._print(c)) + code0 = self._print(e) + lines.append(code0) + lines.append("}") + return "\n".join(lines) + else: + # The piecewise was used in an expression, need to do inline + # operators. This has the downside that inline operators will + # not work for statements that span multiple lines (Matrix or + # Indexed expressions). + ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), + self._print(e)) + for e, c in expr.args[:-1]] + last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) + return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) + + def _print_Indexed(self, expr): + # calculate index for 1d array + dims = expr.shape + elem = S.Zero + offset = S.One + for i in reversed(range(expr.rank)): + elem += expr.indices[i]*offset + offset *= dims[i] + return "{}[{}]".format( + self._print(expr.base.label), + self._print(elem) + ) + + def _print_Pow(self, expr): + PREC = precedence(expr) + if equal_valued(expr.exp, -1): + return '1.0/%s' % (self.parenthesize(expr.base, PREC)) + elif equal_valued(expr.exp, 0.5): + return 'sqrt(%s)' % self._print(expr.base) + else: + try: + e = self._print(float(expr.exp)) + except TypeError: + e = self._print(expr.exp) + return self._print_Function_with_args('pow', ( + self._print(expr.base), + e + )) + + def _print_int(self, expr): + return str(float(expr)) + + def _print_Rational(self, expr): + return "{}.0/{}.0".format(expr.p, expr.q) + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Add(self, expr, order=None): + if self._settings['use_operators']: + return CodePrinter._print_Add(self, expr, order=order) + + terms = expr.as_ordered_terms() + + def partition(p,l): + return reduce(lambda x, y: (x[0]+[y], x[1]) if p(y) else (x[0], x[1]+[y]), l, ([], [])) + def add(a,b): + return self._print_Function_with_args('add', (a, b)) + # return self.known_functions['add']+'(%s, %s)' % (a,b) + neg, pos = partition(lambda arg: arg.could_extract_minus_sign(), terms) + if pos: + s = pos = reduce(lambda a,b: add(a,b), (self._print(t) for t in pos)) + else: + s = pos = self._print(self._settings['zero']) + + if neg: + # sum the absolute values of the negative terms + neg = reduce(lambda a,b: add(a,b), (self._print(-n) for n in neg)) + # then subtract them from the positive terms + s = self._print_Function_with_args('sub', (pos,neg)) + # s = self.known_functions['sub']+'(%s, %s)' % (pos,neg) + return s + + def _print_Mul(self, expr, **kwargs): + if self._settings['use_operators']: + return CodePrinter._print_Mul(self, expr, **kwargs) + terms = expr.as_ordered_factors() + def mul(a,b): + # return self.known_functions['mul']+'(%s, %s)' % (a,b) + return self._print_Function_with_args('mul', (a,b)) + + s = reduce(lambda a,b: mul(a,b), (self._print(t) for t in terms)) + return s + +def glsl_code(expr,assign_to=None,**settings): + """Converts an expr to a string of GLSL code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used for naming the variable or variables + to which the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol`` or ``Indexed`` type object. In cases where ``expr`` + would be printed as an array, a list of string or ``Symbol`` objects + can also be passed. + + This is helpful in case of line-wrapping, or for expressions that + generate multi-line statements. It can also be used to spread an array-like + expression into multiple assignments. + use_operators: bool, optional + If set to False, then *,/,+,- operators will be replaced with functions + mul, add, and sub, which must be implemented by the user, e.g. for + implementing non-standard rings or emulated quad/octal precision. + [default=True] + glsl_types: bool, optional + Set this argument to ``False`` in order to avoid using the ``vec`` and ``mat`` + types. The printer will instead use arrays (or nested arrays). + [default=True] + mat_nested: bool, optional + GLSL version 4.3 and above support nested arrays (arrays of arrays). Set this to ``True`` + to render matrices as nested arrays. + [default=False] + mat_separator: str, optional + By default, matrices are rendered with newlines using this separator, + making them easier to read, but less compact. By removing the newline + this option can be used to make them more vertically compact. + [default=',\n'] + mat_transpose: bool, optional + GLSL's matrix multiplication implementation assumes column-major indexing. + By default, this printer ignores that convention. Setting this option to + ``True`` transposes all matrix output. + [default=False] + array_type: str, optional + The GLSL array constructor type. + [default='float'] + precision : integer, optional + The precision for numbers such as pi [default=15]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, js_function_string)]. See + below for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + + Examples + ======== + + >>> from sympy import glsl_code, symbols, Rational, sin, ceiling, Abs + >>> x, tau = symbols("x, tau") + >>> glsl_code((2*tau)**Rational(7, 2)) + '8*sqrt(2)*pow(tau, 3.5)' + >>> glsl_code(sin(x), assign_to="float y") + 'float y = sin(x);' + + Various GLSL types are supported: + >>> from sympy import Matrix, glsl_code + >>> glsl_code(Matrix([1,2,3])) + 'vec3(1, 2, 3)' + + >>> glsl_code(Matrix([[1, 2],[3, 4]])) + 'mat2(1, 2, 3, 4)' + + Pass ``mat_transpose = True`` to switch to column-major indexing: + >>> glsl_code(Matrix([[1, 2],[3, 4]]), mat_transpose = True) + 'mat2(1, 3, 2, 4)' + + By default, larger matrices get collapsed into float arrays: + >>> print(glsl_code( Matrix([[1,2,3,4,5],[6,7,8,9,10]]) )) + float[10]( + 1, 2, 3, 4, 5, + 6, 7, 8, 9, 10 + ) /* a 2x5 matrix */ + + The type of array constructor used to print GLSL arrays can be controlled + via the ``array_type`` parameter: + >>> glsl_code(Matrix([1,2,3,4,5]), array_type='int') + 'int[5](1, 2, 3, 4, 5)' + + Passing a list of strings or ``symbols`` to the ``assign_to`` parameter will yield + a multi-line assignment for each item in an array-like expression: + >>> x_struct_members = symbols('x.a x.b x.c x.d') + >>> print(glsl_code(Matrix([1,2,3,4]), assign_to=x_struct_members)) + x.a = 1; + x.b = 2; + x.c = 3; + x.d = 4; + + This could be useful in cases where it's desirable to modify members of a + GLSL ``Struct``. It could also be used to spread items from an array-like + expression into various miscellaneous assignments: + >>> misc_assignments = ('x[0]', 'x[1]', 'float y', 'float z') + >>> print(glsl_code(Matrix([1,2,3,4]), assign_to=misc_assignments)) + x[0] = 1; + x[1] = 2; + float y = 3; + float z = 4; + + Passing ``mat_nested = True`` instead prints out nested float arrays, which are + supported in GLSL 4.3 and above. + >>> mat = Matrix([ + ... [ 0, 1, 2], + ... [ 3, 4, 5], + ... [ 6, 7, 8], + ... [ 9, 10, 11], + ... [12, 13, 14]]) + >>> print(glsl_code( mat, mat_nested = True )) + float[5][3]( + float[]( 0, 1, 2), + float[]( 3, 4, 5), + float[]( 6, 7, 8), + float[]( 9, 10, 11), + float[](12, 13, 14) + ) + + + + Custom printing can be defined for certain types by passing a dictionary of + "type" : "function" to the ``user_functions`` kwarg. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + js_function_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "Abs": [(lambda x: not x.is_integer, "fabs"), + ... (lambda x: x.is_integer, "ABS")] + ... } + >>> glsl_code(Abs(x) + ceiling(x), user_functions=custom_functions) + 'fabs(x) + CEIL(x)' + + If further control is needed, addition, subtraction, multiplication and + division operators can be replaced with ``add``, ``sub``, and ``mul`` + functions. This is done by passing ``use_operators = False``: + + >>> x,y,z = symbols('x,y,z') + >>> glsl_code(x*(y+z), use_operators = False) + 'mul(x, add(y, z))' + >>> glsl_code(x*(y+z*(x-y)**z), use_operators = False) + 'mul(x, add(y, mul(z, pow(sub(x, y), z))))' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(glsl_code(expr, tau)) + if (x > 0) { + tau = x + 1; + } + else { + tau = x; + } + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> glsl_code(e.rhs, assign_to=e.lhs, contract=False) + 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(glsl_code(mat, A)) + A[0][0] = pow(x, 2.0); + if (x > 0) { + A[1][0] = x + 1; + } + else { + A[1][0] = x; + } + A[2][0] = sin(x); + """ + return GLSLPrinter(settings).doprint(expr,assign_to) + +def print_glsl(expr, **settings): + """Prints the GLSL representation of the given expression. + + See GLSLPrinter init function for settings. + """ + print(glsl_code(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/gtk.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/gtk.py new file mode 100644 index 0000000000000000000000000000000000000000..4123d7231c730bbde28e33f441470c28b21c78d0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/gtk.py @@ -0,0 +1,16 @@ +from sympy.printing.mathml import mathml +from sympy.utilities.mathml import c2p +import tempfile +import subprocess + + +def print_gtk(x, start_viewer=True): + """Print to Gtkmathview, a gtk widget capable of rendering MathML. + + Needs libgtkmathview-bin""" + with tempfile.NamedTemporaryFile('w') as file: + file.write(c2p(mathml(x), simple=True)) + file.flush() + + if start_viewer: + subprocess.check_call(('mathmlviewer', file.name)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/jscode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/jscode.py new file mode 100644 index 0000000000000000000000000000000000000000..753eb3291dd719ff53b06584de8ebe76c4471a3f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/jscode.py @@ -0,0 +1,332 @@ +""" +Javascript code printer + +The JavascriptCodePrinter converts single SymPy expressions into single +Javascript expressions, using the functions defined in the Javascript +Math object where possible. + +""" + +from __future__ import annotations +from typing import Any + +from sympy.core import S +from sympy.core.numbers import equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE + + +# dictionary mapping SymPy function to (argument_conditions, Javascript_function). +# Used in JavascriptCodePrinter._print_Function(self) +known_functions = { + 'Abs': 'Math.abs', + 'acos': 'Math.acos', + 'acosh': 'Math.acosh', + 'asin': 'Math.asin', + 'asinh': 'Math.asinh', + 'atan': 'Math.atan', + 'atan2': 'Math.atan2', + 'atanh': 'Math.atanh', + 'ceiling': 'Math.ceil', + 'cos': 'Math.cos', + 'cosh': 'Math.cosh', + 'exp': 'Math.exp', + 'floor': 'Math.floor', + 'log': 'Math.log', + 'Max': 'Math.max', + 'Min': 'Math.min', + 'sign': 'Math.sign', + 'sin': 'Math.sin', + 'sinh': 'Math.sinh', + 'tan': 'Math.tan', + 'tanh': 'Math.tanh', +} + + +class JavascriptCodePrinter(CodePrinter): + """"A Printer to convert Python expressions to strings of JavaScript code + """ + printmethod = '_javascript' + language = 'JavaScript' + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'contract': True, + }) + + def __init__(self, settings={}): + CodePrinter.__init__(self, settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + + def _rate_index_position(self, p): + return p*5 + + def _get_statement(self, codestring): + return "%s;" % codestring + + def _get_comment(self, text): + return "// {}".format(text) + + def _declare_number_const(self, name, value): + return "var {} = {};".format(name, value.evalf(self._settings['precision'])) + + def _format_code(self, lines): + return self.indent_code(lines) + + def _traverse_matrix_indices(self, mat): + rows, cols = mat.shape + return ((i, j) for i in range(rows) for j in range(cols)) + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + loopstart = "for (var %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){" + for i in indices: + # Javascript arrays start at 0 and end at dimension-1 + open_lines.append(loopstart % { + 'varble': self._print(i.label), + 'start': self._print(i.lower), + 'end': self._print(i.upper + 1)}) + close_lines.append("}") + return open_lines, close_lines + + def _print_Pow(self, expr): + PREC = precedence(expr) + if equal_valued(expr.exp, -1): + return '1/%s' % (self.parenthesize(expr.base, PREC)) + elif equal_valued(expr.exp, 0.5): + return 'Math.sqrt(%s)' % self._print(expr.base) + elif expr.exp == S.One/3: + return 'Math.cbrt(%s)' % self._print(expr.base) + else: + return 'Math.pow(%s, %s)' % (self._print(expr.base), + self._print(expr.exp)) + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + return '%d/%d' % (p, q) + + def _print_Mod(self, expr): + num, den = expr.args + PREC = precedence(expr) + snum, sden = [self.parenthesize(arg, PREC) for arg in expr.args] + # % is remainder (same sign as numerator), not modulo (same sign as + # denominator), in js. Hence, % only works as modulo if both numbers + # have the same sign + if (num.is_nonnegative and den.is_nonnegative or + num.is_nonpositive and den.is_nonpositive): + return f"{snum} % {sden}" + return f"(({snum} % {sden}) + {sden}) % {sden}" + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Indexed(self, expr): + # calculate index for 1d array + dims = expr.shape + elem = S.Zero + offset = S.One + for i in reversed(range(expr.rank)): + elem += expr.indices[i]*offset + offset *= dims[i] + return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) + + def _print_Exp1(self, expr): + return "Math.E" + + def _print_Pi(self, expr): + return 'Math.PI' + + def _print_Infinity(self, expr): + return 'Number.POSITIVE_INFINITY' + + def _print_NegativeInfinity(self, expr): + return 'Number.NEGATIVE_INFINITY' + + def _print_Piecewise(self, expr): + from sympy.codegen.ast import Assignment + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if expr.has(Assignment): + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s) {" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else {") + else: + lines.append("else if (%s) {" % self._print(c)) + code0 = self._print(e) + lines.append(code0) + lines.append("}") + return "\n".join(lines) + else: + # The piecewise was used in an expression, need to do inline + # operators. This has the downside that inline operators will + # not work for statements that span multiple lines (Matrix or + # Indexed expressions). + ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e)) + for e, c in expr.args[:-1]] + last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr) + return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)]) + + def _print_MatrixElement(self, expr): + return "{}[{}]".format(self.parenthesize(expr.parent, + PRECEDENCE["Atom"], strict=True), + expr.j + expr.i*expr.parent.shape[1]) + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_token = ('{', '(', '{\n', '(\n') + dec_token = ('}', ')') + + code = [ line.lstrip(' \t') for line in code ] + + increase = [ int(any(map(line.endswith, inc_token))) for line in code ] + decrease = [ int(any(map(line.startswith, dec_token))) + for line in code ] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + +def jscode(expr, assign_to=None, **settings): + """Converts an expr to a string of javascript code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of + line-wrapping, or for expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=15]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, js_function_string)]. See + below for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + + Examples + ======== + + >>> from sympy import jscode, symbols, Rational, sin, ceiling, Abs + >>> x, tau = symbols("x, tau") + >>> jscode((2*tau)**Rational(7, 2)) + '8*Math.sqrt(2)*Math.pow(tau, 7/2)' + >>> jscode(sin(x), assign_to="s") + 's = Math.sin(x);' + + Custom printing can be defined for certain types by passing a dictionary of + "type" : "function" to the ``user_functions`` kwarg. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + js_function_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "Abs": [(lambda x: not x.is_integer, "fabs"), + ... (lambda x: x.is_integer, "ABS")] + ... } + >>> jscode(Abs(x) + ceiling(x), user_functions=custom_functions) + 'fabs(x) + CEIL(x)' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(jscode(expr, tau)) + if (x > 0) { + tau = x + 1; + } + else { + tau = x; + } + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> jscode(e.rhs, assign_to=e.lhs, contract=False) + 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' + + Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions + must be provided to ``assign_to``. Note that any expression that can be + generated normally can also exist inside a Matrix: + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(jscode(mat, A)) + A[0] = Math.pow(x, 2); + if (x > 0) { + A[1] = x + 1; + } + else { + A[1] = x; + } + A[2] = Math.sin(x); + """ + + return JavascriptCodePrinter(settings).doprint(expr, assign_to) + + +def print_jscode(expr, **settings): + """Prints the Javascript representation of the given expression. + + See jscode for the meaning of the optional arguments. + """ + print(jscode(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/julia.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/julia.py new file mode 100644 index 0000000000000000000000000000000000000000..3ab815add4d87fe953f646409e3a7bb383b1bbc6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/julia.py @@ -0,0 +1,652 @@ +""" +Julia code printer + +The `JuliaCodePrinter` converts SymPy expressions into Julia expressions. + +A complete code generator, which uses `julia_code` extensively, can be found +in `sympy.utilities.codegen`. The `codegen` module can be used to generate +complete source code files. + +""" + +from __future__ import annotations +from typing import Any + +from sympy.core import Mul, Pow, S, Rational +from sympy.core.mul import _keep_coeff +from sympy.core.numbers import equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE +from re import search + +# List of known functions. First, those that have the same name in +# SymPy and Julia. This is almost certainly incomplete! +known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", + "asin", "acos", "atan", "acot", "asec", "acsc", + "sinh", "cosh", "tanh", "coth", "sech", "csch", + "asinh", "acosh", "atanh", "acoth", "asech", "acsch", + "atan2", "sign", "floor", "log", "exp", + "cbrt", "sqrt", "erf", "erfc", "erfi", + "factorial", "gamma", "digamma", "trigamma", + "polygamma", "beta", + "airyai", "airyaiprime", "airybi", "airybiprime", + "besselj", "bessely", "besseli", "besselk", + "erfinv", "erfcinv"] +# These functions have different names ("SymPy": "Julia"), more +# generally a mapping to (argument_conditions, julia_function). +known_fcns_src2 = { + "Abs": "abs", + "ceiling": "ceil", + "conjugate": "conj", + "hankel1": "hankelh1", + "hankel2": "hankelh2", + "im": "imag", + "re": "real" +} + + +class JuliaCodePrinter(CodePrinter): + """ + A printer to convert expressions to strings of Julia code. + """ + printmethod = "_julia" + language = "Julia" + + _operators = { + 'and': '&&', + 'or': '||', + 'not': '!', + } + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'contract': True, + 'inline': True, + }) + # Note: contract is for expressing tensors as loops (if True), or just + # assignment (if False). FIXME: this should be looked a more carefully + # for Julia. + + def __init__(self, settings={}): + super().__init__(settings) + self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) + self.known_functions.update(dict(known_fcns_src2)) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + + + def _rate_index_position(self, p): + return p*5 + + + def _get_statement(self, codestring): + return "%s" % codestring + + + def _get_comment(self, text): + return "# {}".format(text) + + + def _declare_number_const(self, name, value): + return "const {} = {}".format(name, value) + + + def _format_code(self, lines): + return self.indent_code(lines) + + + def _traverse_matrix_indices(self, mat): + # Julia uses Fortran order (column-major) + rows, cols = mat.shape + return ((i, j) for j in range(cols) for i in range(rows)) + + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + for i in indices: + # Julia arrays start at 1 and end at dimension + var, start, stop = map(self._print, + [i.label, i.lower + 1, i.upper + 1]) + open_lines.append("for %s = %s:%s" % (var, start, stop)) + close_lines.append("end") + return open_lines, close_lines + + + def _print_Mul(self, expr): + # print complex numbers nicely in Julia + if (expr.is_number and expr.is_imaginary and + expr.as_coeff_Mul()[0].is_integer): + return "%sim" % self._print(-S.ImaginaryUnit*expr) + + # cribbed from str.py + prec = precedence(expr) + + c, e = expr.as_coeff_Mul() + if c < 0: + expr = _keep_coeff(-c, e) + sign = "-" + else: + sign = "" + + a = [] # items in the numerator + b = [] # items that are in the denominator (if any) + + pow_paren = [] # Will collect all pow with more than one base element and exp = -1 + + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + # use make_args in case expr was something like -x -> x + args = Mul.make_args(expr) + + # Gather args for numerator/denominator + for item in args: + if (item.is_commutative and item.is_Pow and item.exp.is_Rational + and item.exp.is_negative): + if item.exp != -1: + b.append(Pow(item.base, -item.exp, evaluate=False)) + else: + if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 + pow_paren.append(item) + b.append(Pow(item.base, -item.exp)) + elif item.is_Rational and item is not S.Infinity and item.p == 1: + # Save the Rational type in julia Unless the numerator is 1. + # For example: + # julia_code(Rational(3, 7)*x) --> (3 // 7) * x + # julia_code(x/3) --> x / 3 but not x * (1 // 3) + b.append(Rational(item.q)) + else: + a.append(item) + + a = a or [S.One] + + a_str = [self.parenthesize(x, prec) for x in a] + b_str = [self.parenthesize(x, prec) for x in b] + + # To parenthesize Pow with exp = -1 and having more than one Symbol + for item in pow_paren: + if item.base in b: + b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] + + # from here it differs from str.py to deal with "*" and ".*" + def multjoin(a, a_str): + # here we probably are assuming the constants will come first + r = a_str[0] + for i in range(1, len(a)): + mulsym = '*' if a[i-1].is_number else '.*' + r = "%s %s %s" % (r, mulsym, a_str[i]) + return r + + if not b: + return sign + multjoin(a, a_str) + elif len(b) == 1: + divsym = '/' if b[0].is_number else './' + return "%s %s %s" % (sign+multjoin(a, a_str), divsym, b_str[0]) + else: + divsym = '/' if all(bi.is_number for bi in b) else './' + return "%s %s (%s)" % (sign + multjoin(a, a_str), divsym, multjoin(b, b_str)) + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Pow(self, expr): + powsymbol = '^' if all(x.is_number for x in expr.args) else '.^' + + PREC = precedence(expr) + + if equal_valued(expr.exp, 0.5): + return "sqrt(%s)" % self._print(expr.base) + + if expr.is_commutative: + if equal_valued(expr.exp, -0.5): + sym = '/' if expr.base.is_number else './' + return "1 %s sqrt(%s)" % (sym, self._print(expr.base)) + if equal_valued(expr.exp, -1): + sym = '/' if expr.base.is_number else './' + return "1 %s %s" % (sym, self.parenthesize(expr.base, PREC)) + + return '%s %s %s' % (self.parenthesize(expr.base, PREC), powsymbol, + self.parenthesize(expr.exp, PREC)) + + + def _print_MatPow(self, expr): + PREC = precedence(expr) + return '%s ^ %s' % (self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC)) + + + def _print_Pi(self, expr): + if self._settings["inline"]: + return "pi" + else: + return super()._print_NumberSymbol(expr) + + + def _print_ImaginaryUnit(self, expr): + return "im" + + + def _print_Exp1(self, expr): + if self._settings["inline"]: + return "e" + else: + return super()._print_NumberSymbol(expr) + + + def _print_EulerGamma(self, expr): + if self._settings["inline"]: + return "eulergamma" + else: + return super()._print_NumberSymbol(expr) + + + def _print_Catalan(self, expr): + if self._settings["inline"]: + return "catalan" + else: + return super()._print_NumberSymbol(expr) + + + def _print_GoldenRatio(self, expr): + if self._settings["inline"]: + return "golden" + else: + return super()._print_NumberSymbol(expr) + + + def _print_Assignment(self, expr): + from sympy.codegen.ast import Assignment + from sympy.functions.elementary.piecewise import Piecewise + from sympy.tensor.indexed import IndexedBase + # Copied from codeprinter, but remove special MatrixSymbol treatment + lhs = expr.lhs + rhs = expr.rhs + # We special case assignments that take multiple lines + if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): + # Here we modify Piecewise so each expression is now + # an Assignment, and then continue on the print. + expressions = [] + conditions = [] + for (e, c) in rhs.args: + expressions.append(Assignment(lhs, e)) + conditions.append(c) + temp = Piecewise(*zip(expressions, conditions)) + return self._print(temp) + if self._settings["contract"] and (lhs.has(IndexedBase) or + rhs.has(IndexedBase)): + # Here we check if there is looping to be done, and if so + # print the required loops. + return self._doprint_loops(rhs, lhs) + else: + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + return self._get_statement("%s = %s" % (lhs_code, rhs_code)) + + + def _print_Infinity(self, expr): + return 'Inf' + + + def _print_NegativeInfinity(self, expr): + return '-Inf' + + + def _print_NaN(self, expr): + return 'NaN' + + + def _print_list(self, expr): + return 'Any[' + ', '.join(self._print(a) for a in expr) + ']' + + + def _print_tuple(self, expr): + if len(expr) == 1: + return "(%s,)" % self._print(expr[0]) + else: + return "(%s)" % self.stringify(expr, ", ") + _print_Tuple = _print_tuple + + + def _print_BooleanTrue(self, expr): + return "true" + + + def _print_BooleanFalse(self, expr): + return "false" + + + def _print_bool(self, expr): + return str(expr).lower() + + + # Could generate quadrature code for definite Integrals? + #_print_Integral = _print_not_supported + + + def _print_MatrixBase(self, A): + # Handle zero dimensions: + if S.Zero in A.shape: + return 'zeros(%s, %s)' % (A.rows, A.cols) + elif (A.rows, A.cols) == (1, 1): + return "[%s]" % A[0, 0] + elif A.rows == 1: + return "[%s]" % A.table(self, rowstart='', rowend='', colsep=' ') + elif A.cols == 1: + # note .table would unnecessarily equispace the rows + return "[%s]" % ", ".join([self._print(a) for a in A]) + return "[%s]" % A.table(self, rowstart='', rowend='', + rowsep=';\n', colsep=' ') + + + def _print_SparseRepMatrix(self, A): + from sympy.matrices import Matrix + L = A.col_list() + # make row vectors of the indices and entries + I = Matrix([k[0] + 1 for k in L]) + J = Matrix([k[1] + 1 for k in L]) + AIJ = Matrix([k[2] for k in L]) + return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), + self._print(AIJ), A.rows, A.cols) + + + def _print_MatrixElement(self, expr): + return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + + '[%s,%s]' % (expr.i + 1, expr.j + 1) + + + def _print_MatrixSlice(self, expr): + def strslice(x, lim): + l = x[0] + 1 + h = x[1] + step = x[2] + lstr = self._print(l) + hstr = 'end' if h == lim else self._print(h) + if step == 1: + if l == 1 and h == lim: + return ':' + if l == h: + return lstr + else: + return lstr + ':' + hstr + else: + return ':'.join((lstr, self._print(step), hstr)) + return (self._print(expr.parent) + '[' + + strslice(expr.rowslice, expr.parent.shape[0]) + ',' + + strslice(expr.colslice, expr.parent.shape[1]) + ']') + + + def _print_Indexed(self, expr): + inds = [ self._print(i) for i in expr.indices ] + return "%s[%s]" % (self._print(expr.base.label), ",".join(inds)) + + def _print_Identity(self, expr): + return "eye(%s)" % self._print(expr.shape[0]) + + def _print_HadamardProduct(self, expr): + return ' .* '.join([self.parenthesize(arg, precedence(expr)) + for arg in expr.args]) + + def _print_HadamardPower(self, expr): + PREC = precedence(expr) + return '.**'.join([ + self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC) + ]) + + def _print_Rational(self, expr): + if expr.q == 1: + return str(expr.p) + return "%s // %s" % (expr.p, expr.q) + + # Note: as of 2022, Julia doesn't have spherical Bessel functions + def _print_jn(self, expr): + from sympy.functions import sqrt, besselj + x = expr.argument + expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x) + return self._print(expr2) + + + def _print_yn(self, expr): + from sympy.functions import sqrt, bessely + x = expr.argument + expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x) + return self._print(expr2) + + def _print_sinc(self, expr): + # Julia has the normalized sinc function + return "sinc({})".format(self._print(expr.args[0] / S.Pi)) + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if self._settings["inline"]: + # Express each (cond, expr) pair in a nested Horner form: + # (condition) .* (expr) + (not cond) .* () + # Expressions that result in multiple statements won't work here. + ecpairs = ["({}) ? ({}) :".format + (self._print(c), self._print(e)) + for e, c in expr.args[:-1]] + elast = " (%s)" % self._print(expr.args[-1].expr) + pw = "\n".join(ecpairs) + elast + # Note: current need these outer brackets for 2*pw. Would be + # nicer to teach parenthesize() to do this for us when needed! + return "(" + pw + ")" + else: + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s)" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else") + else: + lines.append("elseif (%s)" % self._print(c)) + code0 = self._print(e) + lines.append(code0) + if i == len(expr.args) - 1: + lines.append("end") + return "\n".join(lines) + + def _print_MatMul(self, expr): + c, m = expr.as_coeff_mmul() + + sign = "" + if c.is_number: + re, im = c.as_real_imag() + if im.is_zero and re.is_negative: + expr = _keep_coeff(-c, m) + sign = "-" + elif re.is_zero and im.is_negative: + expr = _keep_coeff(-c, m) + sign = "-" + + return sign + ' * '.join( + (self.parenthesize(arg, precedence(expr)) for arg in expr.args) + ) + + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + # code mostly copied from ccode + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') + dec_regex = ('^end$', '^elseif ', '^else$') + + # pre-strip left-space from the code + code = [ line.lstrip(' \t') for line in code ] + + increase = [ int(any(search(re, line) for re in inc_regex)) + for line in code ] + decrease = [ int(any(search(re, line) for re in dec_regex)) + for line in code ] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + +def julia_code(expr, assign_to=None, **settings): + r"""Converts `expr` to a string of Julia code. + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for + expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=16]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, cfunction_string)]. See + below for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + inline: bool, optional + If True, we try to create single-statement code instead of multiple + statements. [default=True]. + + Examples + ======== + + >>> from sympy import julia_code, symbols, sin, pi + >>> x = symbols('x') + >>> julia_code(sin(x).series(x).removeO()) + 'x .^ 5 / 120 - x .^ 3 / 6 + x' + + >>> from sympy import Rational, ceiling + >>> x, y, tau = symbols("x, y, tau") + >>> julia_code((2*tau)**Rational(7, 2)) + '8 * sqrt(2) * tau .^ (7 // 2)' + + Note that element-wise (Hadamard) operations are used by default between + symbols. This is because its possible in Julia to write "vectorized" + code. It is harmless if the values are scalars. + + >>> julia_code(sin(pi*x*y), assign_to="s") + 's = sin(pi * x .* y)' + + If you need a matrix product "*" or matrix power "^", you can specify the + symbol as a ``MatrixSymbol``. + + >>> from sympy import Symbol, MatrixSymbol + >>> n = Symbol('n', integer=True, positive=True) + >>> A = MatrixSymbol('A', n, n) + >>> julia_code(3*pi*A**3) + '(3 * pi) * A ^ 3' + + This class uses several rules to decide which symbol to use a product. + Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*". + A HadamardProduct can be used to specify componentwise multiplication ".*" + of two MatrixSymbols. There is currently there is no easy way to specify + scalar symbols, so sometimes the code might have some minor cosmetic + issues. For example, suppose x and y are scalars and A is a Matrix, then + while a human programmer might write "(x^2*y)*A^3", we generate: + + >>> julia_code(x**2*y*A**3) + '(x .^ 2 .* y) * A ^ 3' + + Matrices are supported using Julia inline notation. When using + ``assign_to`` with matrices, the name can be specified either as a string + or as a ``MatrixSymbol``. The dimensions must align in the latter case. + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([[x**2, sin(x), ceiling(x)]]) + >>> julia_code(mat, assign_to='A') + 'A = [x .^ 2 sin(x) ceil(x)]' + + ``Piecewise`` expressions are implemented with logical masking by default. + Alternatively, you can pass "inline=False" to use if-else conditionals. + Note that if the ``Piecewise`` lacks a default term, represented by + ``(expr, True)`` then an error will be thrown. This is to prevent + generating an expression that may not evaluate to anything. + + >>> from sympy import Piecewise + >>> pw = Piecewise((x + 1, x > 0), (x, True)) + >>> julia_code(pw, assign_to=tau) + 'tau = ((x > 0) ? (x + 1) : (x))' + + Note that any expression that can be generated normally can also exist + inside a Matrix: + + >>> mat = Matrix([[x**2, pw, sin(x)]]) + >>> julia_code(mat, assign_to='A') + 'A = [x .^ 2 ((x > 0) ? (x + 1) : (x)) sin(x)]' + + Custom printing can be defined for certain types by passing a dictionary of + "type" : "function" to the ``user_functions`` kwarg. Alternatively, the + dictionary value can be a list of tuples i.e., [(argument_test, + cfunction_string)]. This can be used to call a custom Julia function. + + >>> from sympy import Function + >>> f = Function('f') + >>> g = Function('g') + >>> custom_functions = { + ... "f": "existing_julia_fcn", + ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), + ... (lambda x: not x.is_Matrix, "my_fcn")] + ... } + >>> mat = Matrix([[1, x]]) + >>> julia_code(f(x) + g(x) + g(mat), user_functions=custom_functions) + 'existing_julia_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> julia_code(e.rhs, assign_to=e.lhs, contract=False) + 'Dy[i] = (y[i + 1] - y[i]) ./ (t[i + 1] - t[i])' + """ + return JuliaCodePrinter(settings).doprint(expr, assign_to) + + +def print_julia_code(expr, **settings): + """Prints the Julia representation of the given expression. + + See `julia_code` for the meaning of the optional arguments. + """ + print(julia_code(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/lambdarepr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/lambdarepr.py new file mode 100644 index 0000000000000000000000000000000000000000..87fa0988d138d54d68ab8aef1bbc0f27b243b472 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/lambdarepr.py @@ -0,0 +1,251 @@ +from .pycode import ( + PythonCodePrinter, + MpmathPrinter, +) +from .numpy import NumPyPrinter # NumPyPrinter is imported for backward compatibility +from sympy.core.sorting import default_sort_key + + +__all__ = [ + 'PythonCodePrinter', + 'MpmathPrinter', # MpmathPrinter is published for backward compatibility + 'NumPyPrinter', + 'LambdaPrinter', + 'NumPyPrinter', + 'IntervalPrinter', + 'lambdarepr', +] + + +class LambdaPrinter(PythonCodePrinter): + """ + This printer converts expressions into strings that can be used by + lambdify. + """ + printmethod = "_lambdacode" + + + def _print_And(self, expr): + result = ['('] + for arg in sorted(expr.args, key=default_sort_key): + result.extend(['(', self._print(arg), ')']) + result.append(' and ') + result = result[:-1] + result.append(')') + return ''.join(result) + + def _print_Or(self, expr): + result = ['('] + for arg in sorted(expr.args, key=default_sort_key): + result.extend(['(', self._print(arg), ')']) + result.append(' or ') + result = result[:-1] + result.append(')') + return ''.join(result) + + def _print_Not(self, expr): + result = ['(', 'not (', self._print(expr.args[0]), '))'] + return ''.join(result) + + def _print_BooleanTrue(self, expr): + return "True" + + def _print_BooleanFalse(self, expr): + return "False" + + def _print_ITE(self, expr): + result = [ + '((', self._print(expr.args[1]), + ') if (', self._print(expr.args[0]), + ') else (', self._print(expr.args[2]), '))' + ] + return ''.join(result) + + def _print_NumberSymbol(self, expr): + return str(expr) + + def _print_Pow(self, expr, **kwargs): + # XXX Temporary workaround. Should Python math printer be + # isolated from PythonCodePrinter? + return super(PythonCodePrinter, self)._print_Pow(expr, **kwargs) + + +# numexpr works by altering the string passed to numexpr.evaluate +# rather than by populating a namespace. Thus a special printer... +class NumExprPrinter(LambdaPrinter): + # key, value pairs correspond to SymPy name and numexpr name + # functions not appearing in this dict will raise a TypeError + printmethod = "_numexprcode" + + _numexpr_functions = { + 'sin' : 'sin', + 'cos' : 'cos', + 'tan' : 'tan', + 'asin': 'arcsin', + 'acos': 'arccos', + 'atan': 'arctan', + 'atan2' : 'arctan2', + 'sinh' : 'sinh', + 'cosh' : 'cosh', + 'tanh' : 'tanh', + 'asinh': 'arcsinh', + 'acosh': 'arccosh', + 'atanh': 'arctanh', + 'ln' : 'log', + 'log': 'log', + 'exp': 'exp', + 'sqrt' : 'sqrt', + 'Abs' : 'abs', + 'conjugate' : 'conj', + 'im' : 'imag', + 're' : 'real', + 'where' : 'where', + 'complex' : 'complex', + 'contains' : 'contains', + } + + module = 'numexpr' + + def _print_ImaginaryUnit(self, expr): + return '1j' + + def _print_seq(self, seq, delimiter=', '): + # simplified _print_seq taken from pretty.py + s = [self._print(item) for item in seq] + if s: + return delimiter.join(s) + else: + return "" + + def _print_Function(self, e): + func_name = e.func.__name__ + + nstr = self._numexpr_functions.get(func_name, None) + if nstr is None: + # check for implemented_function + if hasattr(e, '_imp_'): + return "(%s)" % self._print(e._imp_(*e.args)) + else: + raise TypeError("numexpr does not support function '%s'" % + func_name) + return "%s(%s)" % (nstr, self._print_seq(e.args)) + + def _print_Piecewise(self, expr): + "Piecewise function printer" + exprs = [self._print(arg.expr) for arg in expr.args] + conds = [self._print(arg.cond) for arg in expr.args] + # If [default_value, True] is a (expr, cond) sequence in a Piecewise object + # it will behave the same as passing the 'default' kwarg to select() + # *as long as* it is the last element in expr.args. + # If this is not the case, it may be triggered prematurely. + ans = [] + parenthesis_count = 0 + is_last_cond_True = False + for cond, expr in zip(conds, exprs): + if cond == 'True': + ans.append(expr) + is_last_cond_True = True + break + else: + ans.append('where(%s, %s, ' % (cond, expr)) + parenthesis_count += 1 + if not is_last_cond_True: + # See https://github.com/pydata/numexpr/issues/298 + # + # simplest way to put a nan but raises + # 'RuntimeWarning: invalid value encountered in log' + # + # There are other ways to do this such as + # + # >>> import numexpr as ne + # >>> nan = float('nan') + # >>> ne.evaluate('where(x < 0, -1, nan)', {'x': [-1, 2, 3], 'nan':nan}) + # array([-1., nan, nan]) + # + # That needs to be handled in the lambdified function though rather + # than here in the printer. + ans.append('log(-1)') + return ''.join(ans) + ')' * parenthesis_count + + def _print_ITE(self, expr): + from sympy.functions.elementary.piecewise import Piecewise + return self._print(expr.rewrite(Piecewise)) + + def blacklisted(self, expr): + raise TypeError("numexpr cannot be used with %s" % + expr.__class__.__name__) + + # blacklist all Matrix printing + _print_SparseRepMatrix = \ + _print_MutableSparseMatrix = \ + _print_ImmutableSparseMatrix = \ + _print_Matrix = \ + _print_DenseMatrix = \ + _print_MutableDenseMatrix = \ + _print_ImmutableMatrix = \ + _print_ImmutableDenseMatrix = \ + blacklisted + # blacklist some Python expressions + _print_list = \ + _print_tuple = \ + _print_Tuple = \ + _print_dict = \ + _print_Dict = \ + blacklisted + + def _print_NumExprEvaluate(self, expr): + evaluate = self._module_format(self.module +".evaluate") + return "%s('%s', truediv=True)" % (evaluate, self._print(expr.expr)) + + def doprint(self, expr): + from sympy.codegen.ast import CodegenAST + from sympy.codegen.pynodes import NumExprEvaluate + if not isinstance(expr, CodegenAST): + expr = NumExprEvaluate(expr) + return super().doprint(expr) + + def _print_Return(self, expr): + from sympy.codegen.pynodes import NumExprEvaluate + r, = expr.args + if not isinstance(r, NumExprEvaluate): + expr = expr.func(NumExprEvaluate(r)) + return super()._print_Return(expr) + + def _print_Assignment(self, expr): + from sympy.codegen.pynodes import NumExprEvaluate + lhs, rhs, *args = expr.args + if not isinstance(rhs, NumExprEvaluate): + expr = expr.func(lhs, NumExprEvaluate(rhs), *args) + return super()._print_Assignment(expr) + + def _print_CodeBlock(self, expr): + from sympy.codegen.ast import CodegenAST + from sympy.codegen.pynodes import NumExprEvaluate + args = [ arg if isinstance(arg, CodegenAST) else NumExprEvaluate(arg) for arg in expr.args ] + return super()._print_CodeBlock(self, expr.func(*args)) + + +class IntervalPrinter(MpmathPrinter, LambdaPrinter): + """Use ``lambda`` printer but print numbers as ``mpi`` intervals. """ + + def _print_Integer(self, expr): + return "mpi('%s')" % super(PythonCodePrinter, self)._print_Integer(expr) + + def _print_Rational(self, expr): + return "mpi('%s')" % super(PythonCodePrinter, self)._print_Rational(expr) + + def _print_Half(self, expr): + return "mpi('%s')" % super(PythonCodePrinter, self)._print_Rational(expr) + + def _print_Pow(self, expr): + return super(MpmathPrinter, self)._print_Pow(expr, rational=True) + + +for k in NumExprPrinter._numexpr_functions: + setattr(NumExprPrinter, '_print_%s' % k, NumExprPrinter._print_Function) + +def lambdarepr(expr, **settings): + """ + Returns a string usable for lambdifying. + """ + return LambdaPrinter(settings).doprint(expr) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/latex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/latex.py new file mode 100644 index 0000000000000000000000000000000000000000..724df719d560e001deb175649a3769703bdf5ca5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/latex.py @@ -0,0 +1,3318 @@ +""" +A Printer which converts an expression into its LaTeX equivalent. +""" +from __future__ import annotations +from typing import Any, Callable, TYPE_CHECKING + +import itertools + +from sympy.core import Add, Float, Mod, Mul, Number, S, Symbol, Expr +from sympy.core.alphabets import greeks +from sympy.core.containers import Tuple +from sympy.core.function import Function, AppliedUndef, Derivative +from sympy.core.operations import AssocOp +from sympy.core.power import Pow +from sympy.core.sorting import default_sort_key +from sympy.core.sympify import SympifyError +from sympy.logic.boolalg import true, BooleanTrue, BooleanFalse + + +# sympy.printing imports +from sympy.printing.precedence import precedence_traditional +from sympy.printing.printer import Printer, print_function +from sympy.printing.conventions import split_super_sub, requires_partial +from sympy.printing.precedence import precedence, PRECEDENCE + +from mpmath.libmp.libmpf import prec_to_dps, to_str as mlib_to_str + +from sympy.utilities.iterables import has_variety, sift + +import re + +if TYPE_CHECKING: + from sympy.tensor.array import NDimArray + from sympy.vector.basisdependent import BasisDependent + +# Hand-picked functions which can be used directly in both LaTeX and MathJax +# Complete list at +# https://docs.mathjax.org/en/latest/tex.html#supported-latex-commands +# This variable only contains those functions which SymPy uses. +accepted_latex_functions = ['arcsin', 'arccos', 'arctan', 'sin', 'cos', 'tan', + 'sinh', 'cosh', 'tanh', 'sqrt', 'ln', 'log', 'sec', + 'csc', 'cot', 'coth', 're', 'im', 'frac', 'root', + 'arg', + ] + +tex_greek_dictionary = { + 'Alpha': r'\mathrm{A}', + 'Beta': r'\mathrm{B}', + 'Gamma': r'\Gamma', + 'Delta': r'\Delta', + 'Epsilon': r'\mathrm{E}', + 'Zeta': r'\mathrm{Z}', + 'Eta': r'\mathrm{H}', + 'Theta': r'\Theta', + 'Iota': r'\mathrm{I}', + 'Kappa': r'\mathrm{K}', + 'Lambda': r'\Lambda', + 'Mu': r'\mathrm{M}', + 'Nu': r'\mathrm{N}', + 'Xi': r'\Xi', + 'omicron': 'o', + 'Omicron': r'\mathrm{O}', + 'Pi': r'\Pi', + 'Rho': r'\mathrm{P}', + 'Sigma': r'\Sigma', + 'Tau': r'\mathrm{T}', + 'Upsilon': r'\Upsilon', + 'Phi': r'\Phi', + 'Chi': r'\mathrm{X}', + 'Psi': r'\Psi', + 'Omega': r'\Omega', + 'lamda': r'\lambda', + 'Lamda': r'\Lambda', + 'khi': r'\chi', + 'Khi': r'\mathrm{X}', + 'varepsilon': r'\varepsilon', + 'varkappa': r'\varkappa', + 'varphi': r'\varphi', + 'varpi': r'\varpi', + 'varrho': r'\varrho', + 'varsigma': r'\varsigma', + 'vartheta': r'\vartheta', +} + +other_symbols = {'aleph', 'beth', 'daleth', 'gimel', 'ell', 'eth', 'hbar', + 'hslash', 'mho', 'wp'} + +# Variable name modifiers +modifier_dict: dict[str, Callable[[str], str]] = { + # Accents + 'mathring': lambda s: r'\mathring{'+s+r'}', + 'ddddot': lambda s: r'\ddddot{'+s+r'}', + 'dddot': lambda s: r'\dddot{'+s+r'}', + 'ddot': lambda s: r'\ddot{'+s+r'}', + 'dot': lambda s: r'\dot{'+s+r'}', + 'check': lambda s: r'\check{'+s+r'}', + 'breve': lambda s: r'\breve{'+s+r'}', + 'acute': lambda s: r'\acute{'+s+r'}', + 'grave': lambda s: r'\grave{'+s+r'}', + 'tilde': lambda s: r'\tilde{'+s+r'}', + 'hat': lambda s: r'\hat{'+s+r'}', + 'bar': lambda s: r'\bar{'+s+r'}', + 'vec': lambda s: r'\vec{'+s+r'}', + 'prime': lambda s: "{"+s+"}'", + 'prm': lambda s: "{"+s+"}'", + # Faces + 'bold': lambda s: r'\boldsymbol{'+s+r'}', + 'bm': lambda s: r'\boldsymbol{'+s+r'}', + 'cal': lambda s: r'\mathcal{'+s+r'}', + 'scr': lambda s: r'\mathscr{'+s+r'}', + 'frak': lambda s: r'\mathfrak{'+s+r'}', + # Brackets + 'norm': lambda s: r'\left\|{'+s+r'}\right\|', + 'avg': lambda s: r'\left\langle{'+s+r'}\right\rangle', + 'abs': lambda s: r'\left|{'+s+r'}\right|', + 'mag': lambda s: r'\left|{'+s+r'}\right|', +} + +greek_letters_set = frozenset(greeks) + +_between_two_numbers_p = ( + re.compile(r'[0-9][} ]*$'), # search + re.compile(r'(\d|\\frac{\d+}{\d+})'), # match +) + + +def latex_escape(s: str) -> str: + """ + Escape a string such that latex interprets it as plaintext. + + We cannot use verbatim easily with mathjax, so escaping is easier. + Rules from https://tex.stackexchange.com/a/34586/41112. + """ + s = s.replace('\\', r'\textbackslash') + for c in '&%$#_{}': + s = s.replace(c, '\\' + c) + s = s.replace('~', r'\textasciitilde') + s = s.replace('^', r'\textasciicircum') + return s + + +class LatexPrinter(Printer): + printmethod = "_latex" + + _default_settings: dict[str, Any] = { + "full_prec": False, + "fold_frac_powers": False, + "fold_func_brackets": False, + "fold_short_frac": None, + "inv_trig_style": "abbreviated", + "itex": False, + "ln_notation": False, + "long_frac_ratio": None, + "mat_delim": "[", + "mat_str": None, + "mode": "plain", + "mul_symbol": None, + "order": None, + "symbol_names": {}, + "root_notation": True, + "mat_symbol_style": "plain", + "imaginary_unit": "i", + "gothic_re_im": False, + "decimal_separator": "period", + "perm_cyclic": True, + "parenthesize_super": True, + "min": None, + "max": None, + "diff_operator": "d", + "adjoint_style": "dagger", + "disable_split_super_sub": False, + } + + def __init__(self, settings=None): + Printer.__init__(self, settings) + + if 'mode' in self._settings: + valid_modes = ['inline', 'plain', 'equation', + 'equation*'] + if self._settings['mode'] not in valid_modes: + raise ValueError("'mode' must be one of 'inline', 'plain', " + "'equation' or 'equation*'") + + if self._settings['fold_short_frac'] is None and \ + self._settings['mode'] == 'inline': + self._settings['fold_short_frac'] = True + + mul_symbol_table = { + None: r" ", + "ldot": r" \,.\, ", + "dot": r" \cdot ", + "times": r" \times " + } + try: + self._settings['mul_symbol_latex'] = \ + mul_symbol_table[self._settings['mul_symbol']] + except KeyError: + self._settings['mul_symbol_latex'] = \ + self._settings['mul_symbol'] + try: + self._settings['mul_symbol_latex_numbers'] = \ + mul_symbol_table[self._settings['mul_symbol'] or 'dot'] + except KeyError: + if (self._settings['mul_symbol'].strip() in + ['', ' ', '\\', '\\,', '\\:', '\\;', '\\quad']): + self._settings['mul_symbol_latex_numbers'] = \ + mul_symbol_table['dot'] + else: + self._settings['mul_symbol_latex_numbers'] = \ + self._settings['mul_symbol'] + + self._delim_dict = {'(': ')', '[': ']'} + + imaginary_unit_table = { + None: r"i", + "i": r"i", + "ri": r"\mathrm{i}", + "ti": r"\text{i}", + "j": r"j", + "rj": r"\mathrm{j}", + "tj": r"\text{j}", + } + imag_unit = self._settings['imaginary_unit'] + self._settings['imaginary_unit_latex'] = imaginary_unit_table.get(imag_unit, imag_unit) + + diff_operator_table = { + None: r"d", + "d": r"d", + "rd": r"\mathrm{d}", + "td": r"\text{d}", + } + diff_operator = self._settings['diff_operator'] + self._settings["diff_operator_latex"] = diff_operator_table.get(diff_operator, diff_operator) + + def _add_parens(self, s) -> str: + return r"\left({}\right)".format(s) + + # TODO: merge this with the above, which requires a lot of test changes + def _add_parens_lspace(self, s) -> str: + return r"\left( {}\right)".format(s) + + def parenthesize(self, item, level, is_neg=False, strict=False) -> str: + prec_val = precedence_traditional(item) + if is_neg and strict: + return self._add_parens(self._print(item)) + + if (prec_val < level) or ((not strict) and prec_val <= level): + return self._add_parens(self._print(item)) + else: + return self._print(item) + + def parenthesize_super(self, s): + """ + Protect superscripts in s + + If the parenthesize_super option is set, protect with parentheses, else + wrap in braces. + """ + if "^" in s: + if self._settings['parenthesize_super']: + return self._add_parens(s) + else: + return "{{{}}}".format(s) + return s + + def doprint(self, expr) -> str: + tex = Printer.doprint(self, expr) + + if self._settings['mode'] == 'plain': + return tex + elif self._settings['mode'] == 'inline': + return r"$%s$" % tex + elif self._settings['itex']: + return r"$$%s$$" % tex + else: + env_str = self._settings['mode'] + return r"\begin{%s}%s\end{%s}" % (env_str, tex, env_str) + + def _needs_brackets(self, expr) -> bool: + """ + Returns True if the expression needs to be wrapped in brackets when + printed, False otherwise. For example: a + b => True; a => False; + 10 => False; -10 => True. + """ + return not ((expr.is_Integer and expr.is_nonnegative) + or (expr.is_Atom and (expr is not S.NegativeOne + and expr.is_Rational is False))) + + def _needs_function_brackets(self, expr) -> bool: + """ + Returns True if the expression needs to be wrapped in brackets when + passed as an argument to a function, False otherwise. This is a more + liberal version of _needs_brackets, in that many expressions which need + to be wrapped in brackets when added/subtracted/raised to a power do + not need them when passed to a function. Such an example is a*b. + """ + if not self._needs_brackets(expr): + return False + else: + # Muls of the form a*b*c... can be folded + if expr.is_Mul and not self._mul_is_clean(expr): + return True + # Pows which don't need brackets can be folded + elif expr.is_Pow and not self._pow_is_clean(expr): + return True + # Add and Function always need brackets + elif expr.is_Add or expr.is_Function: + return True + else: + return False + + def _needs_mul_brackets(self, expr, first=False, last=False) -> bool: + """ + Returns True if the expression needs to be wrapped in brackets when + printed as part of a Mul, False otherwise. This is True for Add, + but also for some container objects that would not need brackets + when appearing last in a Mul, e.g. an Integral. ``last=True`` + specifies that this expr is the last to appear in a Mul. + ``first=True`` specifies that this expr is the first to appear in + a Mul. + """ + from sympy.concrete.products import Product + from sympy.concrete.summations import Sum + from sympy.integrals.integrals import Integral + + if expr.is_Mul: + if not first and expr.could_extract_minus_sign(): + return True + elif precedence_traditional(expr) < PRECEDENCE["Mul"]: + return True + elif expr.is_Relational: + return True + if expr.is_Piecewise: + return True + if any(expr.has(x) for x in (Mod,)): + return True + if (not last and + any(expr.has(x) for x in (Integral, Product, Sum))): + return True + + return False + + def _needs_add_brackets(self, expr) -> bool: + """ + Returns True if the expression needs to be wrapped in brackets when + printed as part of an Add, False otherwise. This is False for most + things. + """ + if expr.is_Relational: + return True + if any(expr.has(x) for x in (Mod,)): + return True + if expr.is_Add: + return True + return False + + def _mul_is_clean(self, expr) -> bool: + for arg in expr.args: + if arg.is_Function: + return False + return True + + def _pow_is_clean(self, expr) -> bool: + return not self._needs_brackets(expr.base) + + def _do_exponent(self, expr: str, exp): + if exp is not None: + return r"\left(%s\right)^{%s}" % (expr, exp) + else: + return expr + + def _print_Basic(self, expr): + name = self._deal_with_super_sub(expr.__class__.__name__) + if expr.args: + ls = [self._print(o) for o in expr.args] + s = r"\operatorname{{{}}}\left({}\right)" + return s.format(name, ", ".join(ls)) + else: + return r"\text{{{}}}".format(name) + + def _print_bool(self, e: bool | BooleanTrue | BooleanFalse): + return r"\text{%s}" % e + + _print_BooleanTrue = _print_bool + _print_BooleanFalse = _print_bool + + def _print_NoneType(self, e): + return r"\text{%s}" % e + + def _print_Add(self, expr, order=None): + terms = self._as_ordered_terms(expr, order=order) + + tex = "" + for i, term in enumerate(terms): + if i == 0: + pass + elif term.could_extract_minus_sign(): + tex += " - " + term = -term + else: + tex += " + " + term_tex = self._print(term) + if self._needs_add_brackets(term): + term_tex = r"\left(%s\right)" % term_tex + tex += term_tex + + return tex + + def _print_Cycle(self, expr): + from sympy.combinatorics.permutations import Permutation + if expr.size == 0: + return r"\left( \right)" + expr = Permutation(expr) + expr_perm = expr.cyclic_form + siz = expr.size + if expr.array_form[-1] == siz - 1: + expr_perm = expr_perm + [[siz - 1]] + term_tex = '' + for i in expr_perm: + term_tex += str(i).replace(',', r"\;") + term_tex = term_tex.replace('[', r"\left( ") + term_tex = term_tex.replace(']', r"\right)") + return term_tex + + def _print_Permutation(self, expr): + from sympy.combinatorics.permutations import Permutation + from sympy.utilities.exceptions import sympy_deprecation_warning + + perm_cyclic = Permutation.print_cyclic + if perm_cyclic is not None: + sympy_deprecation_warning( + f""" + Setting Permutation.print_cyclic is deprecated. Instead use + init_printing(perm_cyclic={perm_cyclic}). + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-permutation-print_cyclic", + stacklevel=8, + ) + else: + perm_cyclic = self._settings.get("perm_cyclic", True) + + if perm_cyclic: + return self._print_Cycle(expr) + + if expr.size == 0: + return r"\left( \right)" + + lower = [self._print(arg) for arg in expr.array_form] + upper = [self._print(arg) for arg in range(len(lower))] + + row1 = " & ".join(upper) + row2 = " & ".join(lower) + mat = r" \\ ".join((row1, row2)) + return r"\begin{pmatrix} %s \end{pmatrix}" % mat + + + def _print_AppliedPermutation(self, expr): + perm, var = expr.args + return r"\sigma_{%s}(%s)" % (self._print(perm), self._print(var)) + + def _print_Float(self, expr): + # Based off of that in StrPrinter + dps = prec_to_dps(expr._prec) + strip = False if self._settings['full_prec'] else True + low = self._settings["min"] if "min" in self._settings else None + high = self._settings["max"] if "max" in self._settings else None + str_real = mlib_to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high) + + # Must always have a mul symbol (as 2.5 10^{20} just looks odd) + # thus we use the number separator + separator = self._settings['mul_symbol_latex_numbers'] + + if 'e' in str_real: + (mant, exp) = str_real.split('e') + + if exp[0] == '+': + exp = exp[1:] + if self._settings['decimal_separator'] == 'comma': + mant = mant.replace('.','{,}') + + return r"%s%s10^{%s}" % (mant, separator, exp) + elif str_real == "+inf": + return r"\infty" + elif str_real == "-inf": + return r"- \infty" + else: + if self._settings['decimal_separator'] == 'comma': + str_real = str_real.replace('.','{,}') + return str_real + + def _print_Cross(self, expr): + vec1 = expr._expr1 + vec2 = expr._expr2 + return r"%s \times %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), + self.parenthesize(vec2, PRECEDENCE['Mul'])) + + def _print_Curl(self, expr): + vec = expr._expr + return r"\nabla\times %s" % self.parenthesize(vec, PRECEDENCE['Mul']) + + def _print_Divergence(self, expr): + vec = expr._expr + return r"\nabla\cdot %s" % self.parenthesize(vec, PRECEDENCE['Mul']) + + def _print_Dot(self, expr): + vec1 = expr._expr1 + vec2 = expr._expr2 + return r"%s \cdot %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']), + self.parenthesize(vec2, PRECEDENCE['Mul'])) + + def _print_Gradient(self, expr): + func = expr._expr + return r"\nabla %s" % self.parenthesize(func, PRECEDENCE['Mul']) + + def _print_Laplacian(self, expr): + func = expr._expr + return r"\Delta %s" % self.parenthesize(func, PRECEDENCE['Mul']) + + def _print_Mul(self, expr: Expr): + from sympy.simplify import fraction + separator: str = self._settings['mul_symbol_latex'] + numbersep: str = self._settings['mul_symbol_latex_numbers'] + + def convert(expr) -> str: + if not expr.is_Mul: + return str(self._print(expr)) + else: + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + args = list(expr.args) + + # If there are quantities or prefixes, append them at the back. + units, nonunits = sift(args, lambda x: (hasattr(x, "_scale_factor") or hasattr(x, "is_physical_constant")) or + (isinstance(x, Pow) and + hasattr(x.base, "is_physical_constant")), binary=True) + prefixes, units = sift(units, lambda x: hasattr(x, "_scale_factor"), binary=True) + return convert_args(nonunits + prefixes + units) + + def convert_args(args) -> str: + _tex = last_term_tex = "" + + for i, term in enumerate(args): + term_tex = self._print(term) + if not (hasattr(term, "_scale_factor") or hasattr(term, "is_physical_constant")): + if self._needs_mul_brackets(term, first=(i == 0), + last=(i == len(args) - 1)): + term_tex = r"\left(%s\right)" % term_tex + + if _between_two_numbers_p[0].search(last_term_tex) and \ + _between_two_numbers_p[1].match(term_tex): + # between two numbers + _tex += numbersep + elif _tex: + _tex += separator + elif _tex: + _tex += separator + + _tex += term_tex + last_term_tex = term_tex + return _tex + + # Check for unevaluated Mul. In this case we need to make sure the + # identities are visible, multiple Rational factors are not combined + # etc so we display in a straight-forward form that fully preserves all + # args and their order. + # XXX: _print_Pow calls this routine with instances of Pow... + if isinstance(expr, Mul): + args = expr.args + if args[0] is S.One or any(isinstance(arg, Number) for arg in args[1:]): + return convert_args(args) + + include_parens = False + if expr.could_extract_minus_sign(): + expr = -expr + tex = "- " + if expr.is_Add: + tex += "(" + include_parens = True + else: + tex = "" + + numer, denom = fraction(expr, exact=True) + + if denom is S.One and Pow(1, -1, evaluate=False) not in expr.args: + # use the original expression here, since fraction() may have + # altered it when producing numer and denom + tex += convert(expr) + + else: + snumer = convert(numer) + sdenom = convert(denom) + ldenom = len(sdenom.split()) + ratio = self._settings['long_frac_ratio'] + if self._settings['fold_short_frac'] and ldenom <= 2 and \ + "^" not in sdenom: + # handle short fractions + if self._needs_mul_brackets(numer, last=False): + tex += r"\left(%s\right) / %s" % (snumer, sdenom) + else: + tex += r"%s / %s" % (snumer, sdenom) + elif ratio is not None and \ + len(snumer.split()) > ratio*ldenom: + # handle long fractions + if self._needs_mul_brackets(numer, last=True): + tex += r"\frac{1}{%s}%s\left(%s\right)" \ + % (sdenom, separator, snumer) + elif numer.is_Mul: + # split a long numerator + a = S.One + b = S.One + for x in numer.args: + if self._needs_mul_brackets(x, last=False) or \ + len(convert(a*x).split()) > ratio*ldenom or \ + (b.is_commutative is x.is_commutative is False): + b *= x + else: + a *= x + if self._needs_mul_brackets(b, last=True): + tex += r"\frac{%s}{%s}%s\left(%s\right)" \ + % (convert(a), sdenom, separator, convert(b)) + else: + tex += r"\frac{%s}{%s}%s%s" \ + % (convert(a), sdenom, separator, convert(b)) + else: + tex += r"\frac{1}{%s}%s%s" % (sdenom, separator, snumer) + else: + tex += r"\frac{%s}{%s}" % (snumer, sdenom) + + if include_parens: + tex += ")" + return tex + + def _print_AlgebraicNumber(self, expr): + if expr.is_aliased: + return self._print(expr.as_poly().as_expr()) + else: + return self._print(expr.as_expr()) + + def _print_PrimeIdeal(self, expr): + p = self._print(expr.p) + if expr.is_inert: + return rf'\left({p}\right)' + alpha = self._print(expr.alpha.as_expr()) + return rf'\left({p}, {alpha}\right)' + + def _print_Pow(self, expr: Pow): + # Treat x**Rational(1,n) as special case + if expr.exp.is_Rational: + p: int = expr.exp.p # type: ignore + q: int = expr.exp.q # type: ignore + if abs(p) == 1 and q != 1 and self._settings['root_notation']: + base = self._print(expr.base) + if q == 2: + tex = r"\sqrt{%s}" % base + elif self._settings['itex']: + tex = r"\root{%d}{%s}" % (q, base) + else: + tex = r"\sqrt[%d]{%s}" % (q, base) + if expr.exp.is_negative: + return r"\frac{1}{%s}" % tex + else: + return tex + elif self._settings['fold_frac_powers'] and q != 1: + base = self.parenthesize(expr.base, PRECEDENCE['Pow']) + # issue #12886: add parentheses for superscripts raised to powers + if expr.base.is_Symbol: + base = self.parenthesize_super(base) + if expr.base.is_Function: + return self._print(expr.base, exp="%s/%s" % (p, q)) + return r"%s^{%s/%s}" % (base, p, q) + elif expr.exp.is_negative and expr.base.is_commutative: + # special case for 1^(-x), issue 9216 + if expr.base == 1: + return r"%s^{%s}" % (expr.base, expr.exp) + # special case for (1/x)^(-y) and (-1/-x)^(-y), issue 20252 + if expr.base.is_Rational: + base_p: int = expr.base.p # type: ignore + base_q: int = expr.base.q # type: ignore + if base_p * base_q == abs(base_q): + if expr.exp == -1: + return r"\frac{1}{\frac{%s}{%s}}" % (base_p, base_q) + else: + return r"\frac{1}{(\frac{%s}{%s})^{%s}}" % (base_p, base_q, abs(expr.exp)) + # things like 1/x + return self._print_Mul(expr) + if expr.base.is_Function: + return self._print(expr.base, exp=self._print(expr.exp)) + tex = r"%s^{%s}" + return self._helper_print_standard_power(expr, tex) + + def _helper_print_standard_power(self, expr, template: str) -> str: + exp = self._print(expr.exp) + # issue #12886: add parentheses around superscripts raised + # to powers + base = self.parenthesize(expr.base, PRECEDENCE['Pow']) + if expr.base.is_Symbol: + base = self.parenthesize_super(base) + elif expr.base.is_Float: + base = r"{%s}" % base + elif (isinstance(expr.base, Derivative) + and base.startswith(r'\left(') + and re.match(r'\\left\(\\d?d?dot', base) + and base.endswith(r'\right)')): + # don't use parentheses around dotted derivative + base = base[6: -7] # remove outermost added parens + return template % (base, exp) + + def _print_UnevaluatedExpr(self, expr): + return self._print(expr.args[0]) + + def _print_Sum(self, expr): + if len(expr.limits) == 1: + tex = r"\sum_{%s=%s}^{%s} " % \ + tuple([self._print(i) for i in expr.limits[0]]) + else: + def _format_ineq(l): + return r"%s \leq %s \leq %s" % \ + tuple([self._print(s) for s in (l[1], l[0], l[2])]) + + tex = r"\sum_{\substack{%s}} " % \ + str.join('\\\\', [_format_ineq(l) for l in expr.limits]) + + if isinstance(expr.function, Add): + tex += r"\left(%s\right)" % self._print(expr.function) + else: + tex += self._print(expr.function) + + return tex + + def _print_Product(self, expr): + if len(expr.limits) == 1: + tex = r"\prod_{%s=%s}^{%s} " % \ + tuple([self._print(i) for i in expr.limits[0]]) + else: + def _format_ineq(l): + return r"%s \leq %s \leq %s" % \ + tuple([self._print(s) for s in (l[1], l[0], l[2])]) + + tex = r"\prod_{\substack{%s}} " % \ + str.join('\\\\', [_format_ineq(l) for l in expr.limits]) + + if isinstance(expr.function, Add): + tex += r"\left(%s\right)" % self._print(expr.function) + else: + tex += self._print(expr.function) + + return tex + + def _print_BasisDependent(self, expr: 'BasisDependent'): + from sympy.vector import Vector + + o1: list[str] = [] + if expr == expr.zero: + return expr.zero._latex_form + if isinstance(expr, Vector): + items = expr.separate().items() + else: + items = [(0, expr)] + + for system, vect in items: + inneritems = list(vect.components.items()) + inneritems.sort(key=lambda x: x[0].__str__()) + for k, v in inneritems: + if v == 1: + o1.append(' + ' + k._latex_form) + elif v == -1: + o1.append(' - ' + k._latex_form) + else: + arg_str = r'\left(' + self._print(v) + r'\right)' + o1.append(' + ' + arg_str + k._latex_form) + + outstr = (''.join(o1)) + if outstr[1] != '-': + outstr = outstr[3:] + else: + outstr = outstr[1:] + return outstr + + def _print_Indexed(self, expr): + tex_base = self._print(expr.base) + tex = '{'+tex_base+'}'+'_{%s}' % ','.join( + map(self._print, expr.indices)) + return tex + + def _print_IndexedBase(self, expr): + return self._print(expr.label) + + def _print_Idx(self, expr): + label = self._print(expr.label) + if expr.upper is not None: + upper = self._print(expr.upper) + if expr.lower is not None: + lower = self._print(expr.lower) + else: + lower = self._print(S.Zero) + interval = '{lower}\\mathrel{{..}}\\nobreak {upper}'.format( + lower = lower, upper = upper) + return '{{{label}}}_{{{interval}}}'.format( + label = label, interval = interval) + #if no bounds are defined this just prints the label + return label + + def _print_Derivative(self, expr): + if requires_partial(expr.expr): + diff_symbol = r'\partial' + else: + diff_symbol = self._settings["diff_operator_latex"] + + tex = "" + dim = 0 + for x, num in reversed(expr.variable_count): + dim += num + if num == 1: + tex += r"%s %s" % (diff_symbol, self._print(x)) + else: + tex += r"%s %s^{%s}" % (diff_symbol, + self.parenthesize_super(self._print(x)), + self._print(num)) + + if dim == 1: + tex = r"\frac{%s}{%s}" % (diff_symbol, tex) + else: + tex = r"\frac{%s^{%s}}{%s}" % (diff_symbol, self._print(dim), tex) + + if any(i.could_extract_minus_sign() for i in expr.args): + return r"%s %s" % (tex, self.parenthesize(expr.expr, + PRECEDENCE["Mul"], + is_neg=True, + strict=True)) + + return r"%s %s" % (tex, self.parenthesize(expr.expr, + PRECEDENCE["Mul"], + is_neg=False, + strict=True)) + + def _print_Subs(self, subs): + expr, old, new = subs.args + latex_expr = self._print(expr) + latex_old = (self._print(e) for e in old) + latex_new = (self._print(e) for e in new) + latex_subs = r'\\ '.join( + e[0] + '=' + e[1] for e in zip(latex_old, latex_new)) + return r'\left. %s \right|_{\substack{ %s }}' % (latex_expr, + latex_subs) + + def _print_Integral(self, expr): + tex, symbols = "", [] + diff_symbol = self._settings["diff_operator_latex"] + + # Only up to \iiiint exists + if len(expr.limits) <= 4 and all(len(lim) == 1 for lim in expr.limits): + # Use len(expr.limits)-1 so that syntax highlighters don't think + # \" is an escaped quote + tex = r"\i" + "i"*(len(expr.limits) - 1) + "nt" + symbols = [r"\, %s%s" % (diff_symbol, self._print(symbol[0])) + for symbol in expr.limits] + + else: + for lim in reversed(expr.limits): + symbol = lim[0] + tex += r"\int" + + if len(lim) > 1: + if self._settings['mode'] != 'inline' \ + and not self._settings['itex']: + tex += r"\limits" + + if len(lim) == 3: + tex += "_{%s}^{%s}" % (self._print(lim[1]), + self._print(lim[2])) + if len(lim) == 2: + tex += "^{%s}" % (self._print(lim[1])) + + symbols.insert(0, r"\, %s%s" % (diff_symbol, self._print(symbol))) + + return r"%s %s%s" % (tex, self.parenthesize(expr.function, + PRECEDENCE["Mul"], + is_neg=any(i.could_extract_minus_sign() for i in expr.args), + strict=True), + "".join(symbols)) + + def _print_Limit(self, expr): + e, z, z0, dir = expr.args + + tex = r"\lim_{%s \to " % self._print(z) + if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity): + tex += r"%s}" % self._print(z0) + else: + tex += r"%s^%s}" % (self._print(z0), self._print(dir)) + + if isinstance(e, AssocOp): + return r"%s\left(%s\right)" % (tex, self._print(e)) + else: + return r"%s %s" % (tex, self._print(e)) + + def _hprint_Function(self, func: str) -> str: + r''' + Logic to decide how to render a function to latex + - if it is a recognized latex name, use the appropriate latex command + - if it is a single letter, excluding sub- and superscripts, just use that letter + - if it is a longer name, then put \operatorname{} around it and be + mindful of undercores in the name + ''' + func = self._deal_with_super_sub(func) + superscriptidx = func.find("^") + subscriptidx = func.find("_") + if func in accepted_latex_functions: + name = r"\%s" % func + elif len(func) == 1 or func.startswith('\\') or subscriptidx == 1 or superscriptidx == 1: + name = func + else: + if superscriptidx > 0 and subscriptidx > 0: + name = r"\operatorname{%s}%s" %( + func[:min(subscriptidx,superscriptidx)], + func[min(subscriptidx,superscriptidx):]) + elif superscriptidx > 0: + name = r"\operatorname{%s}%s" %( + func[:superscriptidx], + func[superscriptidx:]) + elif subscriptidx > 0: + name = r"\operatorname{%s}%s" %( + func[:subscriptidx], + func[subscriptidx:]) + else: + name = r"\operatorname{%s}" % func + return name + + def _print_Function(self, expr: Function, exp=None) -> str: + r''' + Render functions to LaTeX, handling functions that LaTeX knows about + e.g., sin, cos, ... by using the proper LaTeX command (\sin, \cos, ...). + For single-letter function names, render them as regular LaTeX math + symbols. For multi-letter function names that LaTeX does not know + about, (e.g., Li, sech) use \operatorname{} so that the function name + is rendered in Roman font and LaTeX handles spacing properly. + + expr is the expression involving the function + exp is an exponent + ''' + func = expr.func.__name__ + if hasattr(self, '_print_' + func) and \ + not isinstance(expr, AppliedUndef): + return getattr(self, '_print_' + func)(expr, exp) + else: + args = [str(self._print(arg)) for arg in expr.args] + # How inverse trig functions should be displayed, formats are: + # abbreviated: asin, full: arcsin, power: sin^-1 + inv_trig_style = self._settings['inv_trig_style'] + # If we are dealing with a power-style inverse trig function + inv_trig_power_case = False + # If it is applicable to fold the argument brackets + can_fold_brackets = self._settings['fold_func_brackets'] and \ + len(args) == 1 and \ + not self._needs_function_brackets(expr.args[0]) + + inv_trig_table = [ + "asin", "acos", "atan", + "acsc", "asec", "acot", + "asinh", "acosh", "atanh", + "acsch", "asech", "acoth", + ] + + # If the function is an inverse trig function, handle the style + if func in inv_trig_table: + if inv_trig_style == "abbreviated": + pass + elif inv_trig_style == "full": + func = ("ar" if func[-1] == "h" else "arc") + func[1:] + elif inv_trig_style == "power": + func = func[1:] + inv_trig_power_case = True + + # Can never fold brackets if we're raised to a power + if exp is not None: + can_fold_brackets = False + + if inv_trig_power_case: + if func in accepted_latex_functions: + name = r"\%s^{-1}" % func + else: + name = r"\operatorname{%s}^{-1}" % func + elif exp is not None: + func_tex = self._hprint_Function(func) + func_tex = self.parenthesize_super(func_tex) + name = r'%s^{%s}' % (func_tex, exp) + else: + name = self._hprint_Function(func) + + if can_fold_brackets: + if func in accepted_latex_functions: + # Wrap argument safely to avoid parse-time conflicts + # with the function name itself + name += r" {%s}" + else: + name += r"%s" + else: + name += r"{\left(%s \right)}" + + if inv_trig_power_case and exp is not None: + name += r"^{%s}" % exp + + return name % ",".join(args) + + def _print_UndefinedFunction(self, expr): + return self._hprint_Function(str(expr)) + + def _print_ElementwiseApplyFunction(self, expr): + return r"{%s}_{\circ}\left({%s}\right)" % ( + self._print(expr.function), + self._print(expr.expr), + ) + + @property + def _special_function_classes(self): + from sympy.functions.special.tensor_functions import KroneckerDelta + from sympy.functions.special.gamma_functions import gamma, lowergamma + from sympy.functions.special.beta_functions import beta + from sympy.functions.special.delta_functions import DiracDelta + from sympy.functions.special.error_functions import Chi + return {KroneckerDelta: r'\delta', + gamma: r'\Gamma', + lowergamma: r'\gamma', + beta: r'\operatorname{B}', + DiracDelta: r'\delta', + Chi: r'\operatorname{Chi}'} + + def _print_FunctionClass(self, expr): + for cls in self._special_function_classes: + if issubclass(expr, cls) and expr.__name__ == cls.__name__: + return self._special_function_classes[cls] + return self._hprint_Function(str(expr)) + + def _print_Lambda(self, expr): + symbols, expr = expr.args + + if len(symbols) == 1: + symbols = self._print(symbols[0]) + else: + symbols = self._print(tuple(symbols)) + + tex = r"\left( %s \mapsto %s \right)" % (symbols, self._print(expr)) + + return tex + + def _print_IdentityFunction(self, expr): + return r"\left( x \mapsto x \right)" + + def _hprint_variadic_function(self, expr, exp=None) -> str: + args = sorted(expr.args, key=default_sort_key) + texargs = [r"%s" % self._print(symbol) for symbol in args] + tex = r"\%s\left(%s\right)" % (str(expr.func).lower(), + ", ".join(texargs)) + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + _print_Min = _print_Max = _hprint_variadic_function + + def _print_floor(self, expr, exp=None): + tex = r"\left\lfloor{%s}\right\rfloor" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_ceiling(self, expr, exp=None): + tex = r"\left\lceil{%s}\right\rceil" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_log(self, expr, exp=None): + if not self._settings["ln_notation"]: + tex = r"\log{\left(%s \right)}" % self._print(expr.args[0]) + else: + tex = r"\ln{\left(%s \right)}" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_Abs(self, expr, exp=None): + tex = r"\left|{%s}\right|" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_re(self, expr, exp=None): + if self._settings['gothic_re_im']: + tex = r"\Re{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) + else: + tex = r"\operatorname{{re}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) + + return self._do_exponent(tex, exp) + + def _print_im(self, expr, exp=None): + if self._settings['gothic_re_im']: + tex = r"\Im{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom']) + else: + tex = r"\operatorname{{im}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom'])) + + return self._do_exponent(tex, exp) + + def _print_Not(self, e): + from sympy.logic.boolalg import (Equivalent, Implies) + if isinstance(e.args[0], Equivalent): + return self._print_Equivalent(e.args[0], r"\not\Leftrightarrow") + if isinstance(e.args[0], Implies): + return self._print_Implies(e.args[0], r"\not\Rightarrow") + if (e.args[0].is_Boolean): + return r"\neg \left(%s\right)" % self._print(e.args[0]) + else: + return r"\neg %s" % self._print(e.args[0]) + + def _print_LogOp(self, args, char): + arg = args[0] + if arg.is_Boolean and not arg.is_Not: + tex = r"\left(%s\right)" % self._print(arg) + else: + tex = r"%s" % self._print(arg) + + for arg in args[1:]: + if arg.is_Boolean and not arg.is_Not: + tex += r" %s \left(%s\right)" % (char, self._print(arg)) + else: + tex += r" %s %s" % (char, self._print(arg)) + + return tex + + def _print_And(self, e): + args = sorted(e.args, key=default_sort_key) + return self._print_LogOp(args, r"\wedge") + + def _print_Or(self, e): + args = sorted(e.args, key=default_sort_key) + return self._print_LogOp(args, r"\vee") + + def _print_Xor(self, e): + args = sorted(e.args, key=default_sort_key) + return self._print_LogOp(args, r"\veebar") + + def _print_Implies(self, e, altchar=None): + return self._print_LogOp(e.args, altchar or r"\Rightarrow") + + def _print_Equivalent(self, e, altchar=None): + args = sorted(e.args, key=default_sort_key) + return self._print_LogOp(args, altchar or r"\Leftrightarrow") + + def _print_conjugate(self, expr, exp=None): + tex = r"\overline{%s}" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_polar_lift(self, expr, exp=None): + func = r"\operatorname{polar\_lift}" + arg = r"{\left(%s \right)}" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}%s" % (func, exp, arg) + else: + return r"%s%s" % (func, arg) + + def _print_ExpBase(self, expr, exp=None): + # TODO should exp_polar be printed differently? + # what about exp_polar(0), exp_polar(1)? + tex = r"e^{%s}" % self._print(expr.args[0]) + return self._do_exponent(tex, exp) + + def _print_Exp1(self, expr, exp=None): + return "e" + + def _print_elliptic_k(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"K^{%s}%s" % (exp, tex) + else: + return r"K%s" % tex + + def _print_elliptic_f(self, expr, exp=None): + tex = r"\left(%s\middle| %s\right)" % \ + (self._print(expr.args[0]), self._print(expr.args[1])) + if exp is not None: + return r"F^{%s}%s" % (exp, tex) + else: + return r"F%s" % tex + + def _print_elliptic_e(self, expr, exp=None): + if len(expr.args) == 2: + tex = r"\left(%s\middle| %s\right)" % \ + (self._print(expr.args[0]), self._print(expr.args[1])) + else: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"E^{%s}%s" % (exp, tex) + else: + return r"E%s" % tex + + def _print_elliptic_pi(self, expr, exp=None): + if len(expr.args) == 3: + tex = r"\left(%s; %s\middle| %s\right)" % \ + (self._print(expr.args[0]), self._print(expr.args[1]), + self._print(expr.args[2])) + else: + tex = r"\left(%s\middle| %s\right)" % \ + (self._print(expr.args[0]), self._print(expr.args[1])) + if exp is not None: + return r"\Pi^{%s}%s" % (exp, tex) + else: + return r"\Pi%s" % tex + + def _print_beta(self, expr, exp=None): + x = expr.args[0] + # Deal with unevaluated single argument beta + y = expr.args[0] if len(expr.args) == 1 else expr.args[1] + tex = rf"\left({x}, {y}\right)" + + if exp is not None: + return r"\operatorname{B}^{%s}%s" % (exp, tex) + else: + return r"\operatorname{B}%s" % tex + + def _print_betainc(self, expr, exp=None, operator='B'): + largs = [self._print(arg) for arg in expr.args] + tex = r"\left(%s, %s\right)" % (largs[0], largs[1]) + + if exp is not None: + return r"\operatorname{%s}_{(%s, %s)}^{%s}%s" % (operator, largs[2], largs[3], exp, tex) + else: + return r"\operatorname{%s}_{(%s, %s)}%s" % (operator, largs[2], largs[3], tex) + + def _print_betainc_regularized(self, expr, exp=None): + return self._print_betainc(expr, exp, operator='I') + + def _print_uppergamma(self, expr, exp=None): + tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), + self._print(expr.args[1])) + + if exp is not None: + return r"\Gamma^{%s}%s" % (exp, tex) + else: + return r"\Gamma%s" % tex + + def _print_lowergamma(self, expr, exp=None): + tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]), + self._print(expr.args[1])) + + if exp is not None: + return r"\gamma^{%s}%s" % (exp, tex) + else: + return r"\gamma%s" % tex + + def _hprint_one_arg_func(self, expr, exp=None) -> str: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}%s" % (self._print(expr.func), exp, tex) + else: + return r"%s%s" % (self._print(expr.func), tex) + + _print_gamma = _hprint_one_arg_func + + def _print_Chi(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"\operatorname{Chi}^{%s}%s" % (exp, tex) + else: + return r"\operatorname{Chi}%s" % tex + + def _print_expint(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[1]) + nu = self._print(expr.args[0]) + + if exp is not None: + return r"\operatorname{E}_{%s}^{%s}%s" % (nu, exp, tex) + else: + return r"\operatorname{E}_{%s}%s" % (nu, tex) + + def _print_fresnels(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"S^{%s}%s" % (exp, tex) + else: + return r"S%s" % tex + + def _print_fresnelc(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"C^{%s}%s" % (exp, tex) + else: + return r"C%s" % tex + + def _print_subfactorial(self, expr, exp=None): + tex = r"!%s" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) + + if exp is not None: + return r"\left(%s\right)^{%s}" % (tex, exp) + else: + return tex + + def _print_factorial(self, expr, exp=None): + tex = r"%s!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_factorial2(self, expr, exp=None): + tex = r"%s!!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"]) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_binomial(self, expr, exp=None): + tex = r"{\binom{%s}{%s}}" % (self._print(expr.args[0]), + self._print(expr.args[1])) + + if exp is not None: + return r"%s^{%s}" % (tex, exp) + else: + return tex + + def _print_RisingFactorial(self, expr, exp=None): + n, k = expr.args + base = r"%s" % self.parenthesize(n, PRECEDENCE['Func']) + + tex = r"{%s}^{\left(%s\right)}" % (base, self._print(k)) + + return self._do_exponent(tex, exp) + + def _print_FallingFactorial(self, expr, exp=None): + n, k = expr.args + sub = r"%s" % self.parenthesize(k, PRECEDENCE['Func']) + + tex = r"{\left(%s\right)}_{%s}" % (self._print(n), sub) + + return self._do_exponent(tex, exp) + + def _hprint_BesselBase(self, expr, exp, sym: str) -> str: + tex = r"%s" % (sym) + + need_exp = False + if exp is not None: + if tex.find('^') == -1: + tex = r"%s^{%s}" % (tex, exp) + else: + need_exp = True + + tex = r"%s_{%s}\left(%s\right)" % (tex, self._print(expr.order), + self._print(expr.argument)) + + if need_exp: + tex = self._do_exponent(tex, exp) + return tex + + def _hprint_vec(self, vec) -> str: + if not vec: + return "" + s = "" + for i in vec[:-1]: + s += "%s, " % self._print(i) + s += self._print(vec[-1]) + return s + + def _print_besselj(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'J') + + def _print_besseli(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'I') + + def _print_besselk(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'K') + + def _print_bessely(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'Y') + + def _print_yn(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'y') + + def _print_jn(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'j') + + def _print_hankel1(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'H^{(1)}') + + def _print_hankel2(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'H^{(2)}') + + def _print_hn1(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'h^{(1)}') + + def _print_hn2(self, expr, exp=None): + return self._hprint_BesselBase(expr, exp, 'h^{(2)}') + + def _hprint_airy(self, expr, exp=None, notation="") -> str: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"%s^{%s}%s" % (notation, exp, tex) + else: + return r"%s%s" % (notation, tex) + + def _hprint_airy_prime(self, expr, exp=None, notation="") -> str: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + + if exp is not None: + return r"{%s^\prime}^{%s}%s" % (notation, exp, tex) + else: + return r"%s^\prime%s" % (notation, tex) + + def _print_airyai(self, expr, exp=None): + return self._hprint_airy(expr, exp, 'Ai') + + def _print_airybi(self, expr, exp=None): + return self._hprint_airy(expr, exp, 'Bi') + + def _print_airyaiprime(self, expr, exp=None): + return self._hprint_airy_prime(expr, exp, 'Ai') + + def _print_airybiprime(self, expr, exp=None): + return self._hprint_airy_prime(expr, exp, 'Bi') + + def _print_hyper(self, expr, exp=None): + tex = r"{{}_{%s}F_{%s}\left(\begin{matrix} %s \\ %s \end{matrix}" \ + r"\middle| {%s} \right)}" % \ + (self._print(len(expr.ap)), self._print(len(expr.bq)), + self._hprint_vec(expr.ap), self._hprint_vec(expr.bq), + self._print(expr.argument)) + + if exp is not None: + tex = r"{%s}^{%s}" % (tex, exp) + return tex + + def _print_meijerg(self, expr, exp=None): + tex = r"{G_{%s, %s}^{%s, %s}\left(\begin{matrix} %s & %s \\" \ + r"%s & %s \end{matrix} \middle| {%s} \right)}" % \ + (self._print(len(expr.ap)), self._print(len(expr.bq)), + self._print(len(expr.bm)), self._print(len(expr.an)), + self._hprint_vec(expr.an), self._hprint_vec(expr.aother), + self._hprint_vec(expr.bm), self._hprint_vec(expr.bother), + self._print(expr.argument)) + + if exp is not None: + tex = r"{%s}^{%s}" % (tex, exp) + return tex + + def _print_dirichlet_eta(self, expr, exp=None): + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"\eta^{%s}%s" % (exp, tex) + return r"\eta%s" % tex + + def _print_zeta(self, expr, exp=None): + if len(expr.args) == 2: + tex = r"\left(%s, %s\right)" % tuple(map(self._print, expr.args)) + else: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"\zeta^{%s}%s" % (exp, tex) + return r"\zeta%s" % tex + + def _print_stieltjes(self, expr, exp=None): + if len(expr.args) == 2: + tex = r"_{%s}\left(%s\right)" % tuple(map(self._print, expr.args)) + else: + tex = r"_{%s}" % self._print(expr.args[0]) + if exp is not None: + return r"\gamma%s^{%s}" % (tex, exp) + return r"\gamma%s" % tex + + def _print_lerchphi(self, expr, exp=None): + tex = r"\left(%s, %s, %s\right)" % tuple(map(self._print, expr.args)) + if exp is None: + return r"\Phi%s" % tex + return r"\Phi^{%s}%s" % (exp, tex) + + def _print_polylog(self, expr, exp=None): + s, z = map(self._print, expr.args) + tex = r"\left(%s\right)" % z + if exp is None: + return r"\operatorname{Li}_{%s}%s" % (s, tex) + return r"\operatorname{Li}_{%s}^{%s}%s" % (s, exp, tex) + + def _print_jacobi(self, expr, exp=None): + n, a, b, x = map(self._print, expr.args) + tex = r"P_{%s}^{\left(%s,%s\right)}\left(%s\right)" % (n, a, b, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_gegenbauer(self, expr, exp=None): + n, a, x = map(self._print, expr.args) + tex = r"C_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_chebyshevt(self, expr, exp=None): + n, x = map(self._print, expr.args) + tex = r"T_{%s}\left(%s\right)" % (n, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_chebyshevu(self, expr, exp=None): + n, x = map(self._print, expr.args) + tex = r"U_{%s}\left(%s\right)" % (n, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_legendre(self, expr, exp=None): + n, x = map(self._print, expr.args) + tex = r"P_{%s}\left(%s\right)" % (n, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_assoc_legendre(self, expr, exp=None): + n, a, x = map(self._print, expr.args) + tex = r"P_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_hermite(self, expr, exp=None): + n, x = map(self._print, expr.args) + tex = r"H_{%s}\left(%s\right)" % (n, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_laguerre(self, expr, exp=None): + n, x = map(self._print, expr.args) + tex = r"L_{%s}\left(%s\right)" % (n, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_assoc_laguerre(self, expr, exp=None): + n, a, x = map(self._print, expr.args) + tex = r"L_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_Ynm(self, expr, exp=None): + n, m, theta, phi = map(self._print, expr.args) + tex = r"Y_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def _print_Znm(self, expr, exp=None): + n, m, theta, phi = map(self._print, expr.args) + tex = r"Z_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi) + if exp is not None: + tex = r"\left(" + tex + r"\right)^{%s}" % (exp) + return tex + + def __print_mathieu_functions(self, character, args, prime=False, exp=None): + a, q, z = map(self._print, args) + sup = r"^{\prime}" if prime else "" + exp = "" if not exp else "^{%s}" % exp + return r"%s%s\left(%s, %s, %s\right)%s" % (character, sup, a, q, z, exp) + + def _print_mathieuc(self, expr, exp=None): + return self.__print_mathieu_functions("C", expr.args, exp=exp) + + def _print_mathieus(self, expr, exp=None): + return self.__print_mathieu_functions("S", expr.args, exp=exp) + + def _print_mathieucprime(self, expr, exp=None): + return self.__print_mathieu_functions("C", expr.args, prime=True, exp=exp) + + def _print_mathieusprime(self, expr, exp=None): + return self.__print_mathieu_functions("S", expr.args, prime=True, exp=exp) + + def _print_Rational(self, expr): + if expr.q != 1: + sign = "" + p = expr.p + if expr.p < 0: + sign = "- " + p = -p + if self._settings['fold_short_frac']: + return r"%s%d / %d" % (sign, p, expr.q) + return r"%s\frac{%d}{%d}" % (sign, p, expr.q) + else: + return self._print(expr.p) + + def _print_Order(self, expr): + s = self._print(expr.expr) + if expr.point and any(p != S.Zero for p in expr.point) or \ + len(expr.variables) > 1: + s += '; ' + if len(expr.variables) > 1: + s += self._print(expr.variables) + elif expr.variables: + s += self._print(expr.variables[0]) + s += r'\rightarrow ' + if len(expr.point) > 1: + s += self._print(expr.point) + else: + s += self._print(expr.point[0]) + return r"O\left(%s\right)" % s + + def _print_Symbol(self, expr: Symbol, style='plain'): + name: str = self._settings['symbol_names'].get(expr) + if name is not None: + return name + + return self._deal_with_super_sub(expr.name, style=style) + + _print_RandomSymbol = _print_Symbol + + def _split_super_sub(self, name: str) -> tuple[str, list[str], list[str]]: + if name is None or '{' in name: + return (name, [], []) + elif self._settings["disable_split_super_sub"]: + name, supers, subs = (name.replace('_', '\\_').replace('^', '\\^'), [], []) + else: + name, supers, subs = split_super_sub(name) + name = translate(name) + supers = [translate(sup) for sup in supers] + subs = [translate(sub) for sub in subs] + return (name, supers, subs) + + def _deal_with_super_sub(self, string: str, style='plain') -> str: + name, supers, subs = self._split_super_sub(string) + + # apply the style only to the name + if style == 'bold': + name = "\\mathbf{{{}}}".format(name) + + # glue all items together: + if supers: + name += "^{%s}" % " ".join(supers) + if subs: + name += "_{%s}" % " ".join(subs) + + return name + + def _print_Relational(self, expr): + if self._settings['itex']: + gt = r"\gt" + lt = r"\lt" + else: + gt = ">" + lt = "<" + + charmap = { + "==": "=", + ">": gt, + "<": lt, + ">=": r"\geq", + "<=": r"\leq", + "!=": r"\neq", + } + + return "%s %s %s" % (self._print(expr.lhs), + charmap[expr.rel_op], self._print(expr.rhs)) + + def _print_Piecewise(self, expr): + ecpairs = [r"%s & \text{for}\: %s" % (self._print(e), self._print(c)) + for e, c in expr.args[:-1]] + if expr.args[-1].cond == true: + ecpairs.append(r"%s & \text{otherwise}" % + self._print(expr.args[-1].expr)) + else: + ecpairs.append(r"%s & \text{for}\: %s" % + (self._print(expr.args[-1].expr), + self._print(expr.args[-1].cond))) + tex = r"\begin{cases} %s \end{cases}" + return tex % r" \\".join(ecpairs) + + def _print_matrix_contents(self, expr): + lines = [] + + for line in range(expr.rows): # horrible, should be 'rows' + lines.append(" & ".join([self._print(i) for i in expr[line, :]])) + + mat_str = self._settings['mat_str'] + if mat_str is None: + if self._settings['mode'] == 'inline': + mat_str = 'smallmatrix' + else: + if (expr.cols <= 10) is True: + mat_str = 'matrix' + else: + mat_str = 'array' + + out_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' + out_str = out_str.replace('%MATSTR%', mat_str) + if mat_str == 'array': + out_str = out_str.replace('%s', '{' + 'c'*expr.cols + '}%s') + return out_str % r"\\".join(lines) + + def _print_MatrixBase(self, expr): + out_str = self._print_matrix_contents(expr) + if self._settings['mat_delim']: + left_delim = self._settings['mat_delim'] + right_delim = self._delim_dict[left_delim] + out_str = r'\left' + left_delim + out_str + \ + r'\right' + right_delim + return out_str + + def _print_MatrixElement(self, expr): + matrix_part = self.parenthesize(expr.parent, PRECEDENCE['Atom'], strict=True) + index_part = f"{self._print(expr.i)},{self._print(expr.j)}" + return f"{{{matrix_part}}}_{{{index_part}}}" + + def _print_MatrixSlice(self, expr): + def latexslice(x, dim): + x = list(x) + if x[2] == 1: + del x[2] + if x[0] == 0: + x[0] = None + if x[1] == dim: + x[1] = None + return ':'.join(self._print(xi) if xi is not None else '' for xi in x) + return (self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) + r'\left[' + + latexslice(expr.rowslice, expr.parent.rows) + ', ' + + latexslice(expr.colslice, expr.parent.cols) + r'\right]') + + def _print_BlockMatrix(self, expr): + return self._print(expr.blocks) + + def _print_Transpose(self, expr): + mat = expr.arg + from sympy.matrices import MatrixSymbol, BlockMatrix + if (not isinstance(mat, MatrixSymbol) and + not isinstance(mat, BlockMatrix) and mat.is_MatrixExpr): + return r"\left(%s\right)^{T}" % self._print(mat) + else: + s = self.parenthesize(mat, precedence_traditional(expr), True) + if '^' in s: + return r"\left(%s\right)^{T}" % s + else: + return "%s^{T}" % s + + def _print_Trace(self, expr): + mat = expr.arg + return r"\operatorname{tr}\left(%s \right)" % self._print(mat) + + def _print_Adjoint(self, expr): + style_to_latex = { + "dagger" : r"\dagger", + "star" : r"\ast", + "hermitian": r"\mathsf{H}" + } + adjoint_style = style_to_latex.get(self._settings["adjoint_style"], r"\dagger") + mat = expr.arg + from sympy.matrices import MatrixSymbol, BlockMatrix + if (not isinstance(mat, MatrixSymbol) and + not isinstance(mat, BlockMatrix) and mat.is_MatrixExpr): + return r"\left(%s\right)^{%s}" % (self._print(mat), adjoint_style) + else: + s = self.parenthesize(mat, precedence_traditional(expr), True) + if '^' in s: + return r"\left(%s\right)^{%s}" % (s, adjoint_style) + else: + return r"%s^{%s}" % (s, adjoint_style) + + def _print_MatMul(self, expr): + from sympy import MatMul + + # Parenthesize nested MatMul but not other types of Mul objects: + parens = lambda x: self._print(x) if isinstance(x, Mul) and not isinstance(x, MatMul) else \ + self.parenthesize(x, precedence_traditional(expr), False) + + args = list(expr.args) + if expr.could_extract_minus_sign(): + if args[0] == -1: + args = args[1:] + else: + args[0] = -args[0] + return '- ' + ' '.join(map(parens, args)) + else: + return ' '.join(map(parens, args)) + + def _print_DotProduct(self, expr): + level = precedence_traditional(expr) + left, right = expr.args + return rf"{self.parenthesize(left, level)} \cdot {self.parenthesize(right, level)}" + + def _print_Determinant(self, expr): + mat = expr.arg + if mat.is_MatrixExpr: + from sympy.matrices.expressions.blockmatrix import BlockMatrix + if isinstance(mat, BlockMatrix): + return r"\left|{%s}\right|" % self._print_matrix_contents(mat.blocks) + return r"\left|{%s}\right|" % self._print(mat) + return r"\left|{%s}\right|" % self._print_matrix_contents(mat) + + + def _print_Mod(self, expr, exp=None): + if exp is not None: + return r'\left(%s \bmod %s\right)^{%s}' % \ + (self.parenthesize(expr.args[0], PRECEDENCE['Mul'], + strict=True), + self.parenthesize(expr.args[1], PRECEDENCE['Mul'], + strict=True), + exp) + return r'%s \bmod %s' % (self.parenthesize(expr.args[0], + PRECEDENCE['Mul'], + strict=True), + self.parenthesize(expr.args[1], + PRECEDENCE['Mul'], + strict=True)) + + def _print_HadamardProduct(self, expr): + args = expr.args + prec = PRECEDENCE['Pow'] + parens = self.parenthesize + + return r' \circ '.join( + (parens(arg, prec, strict=True) for arg in args)) + + def _print_HadamardPower(self, expr): + if precedence_traditional(expr.exp) < PRECEDENCE["Mul"]: + template = r"%s^{\circ \left({%s}\right)}" + else: + template = r"%s^{\circ {%s}}" + return self._helper_print_standard_power(expr, template) + + def _print_KroneckerProduct(self, expr): + args = expr.args + prec = PRECEDENCE['Pow'] + parens = self.parenthesize + + return r' \otimes '.join( + (parens(arg, prec, strict=True) for arg in args)) + + def _print_MatPow(self, expr): + base, exp = expr.base, expr.exp + from sympy.matrices import MatrixSymbol + if not isinstance(base, MatrixSymbol) and base.is_MatrixExpr: + return "\\left(%s\\right)^{%s}" % (self._print(base), + self._print(exp)) + else: + base_str = self._print(base) + if '^' in base_str: + return r"\left(%s\right)^{%s}" % (base_str, self._print(exp)) + else: + return "%s^{%s}" % (base_str, self._print(exp)) + + def _print_MatrixSymbol(self, expr): + return self._print_Symbol(expr, style=self._settings[ + 'mat_symbol_style']) + + def _print_ZeroMatrix(self, Z): + return "0" if self._settings[ + 'mat_symbol_style'] == 'plain' else r"\mathbf{0}" + + def _print_OneMatrix(self, O): + return "1" if self._settings[ + 'mat_symbol_style'] == 'plain' else r"\mathbf{1}" + + def _print_Identity(self, I): + return r"\mathbb{I}" if self._settings[ + 'mat_symbol_style'] == 'plain' else r"\mathbf{I}" + + def _print_PermutationMatrix(self, P): + perm_str = self._print(P.args[0]) + return "P_{%s}" % perm_str + + def _print_NDimArray(self, expr: NDimArray): + + if expr.rank() == 0: + return self._print(expr[()]) + + mat_str = self._settings['mat_str'] + if mat_str is None: + if self._settings['mode'] == 'inline': + mat_str = 'smallmatrix' + else: + if (expr.rank() == 0) or (expr.shape[-1] <= 10): + mat_str = 'matrix' + else: + mat_str = 'array' + block_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}' + block_str = block_str.replace('%MATSTR%', mat_str) + if mat_str == 'array': + block_str = block_str.replace('%s', '{' + 'c'*expr.shape[0] + '}%s') + + if self._settings['mat_delim']: + left_delim: str = self._settings['mat_delim'] + right_delim = self._delim_dict[left_delim] + block_str = r'\left' + left_delim + block_str + \ + r'\right' + right_delim + + if expr.rank() == 0: + return block_str % "" + + level_str: list[list[str]] = [[] for i in range(expr.rank() + 1)] + shape_ranges = [list(range(i)) for i in expr.shape] + for outer_i in itertools.product(*shape_ranges): + level_str[-1].append(self._print(expr[outer_i])) + even = True + for back_outer_i in range(expr.rank()-1, -1, -1): + if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]: + break + if even: + level_str[back_outer_i].append( + r" & ".join(level_str[back_outer_i+1])) + else: + level_str[back_outer_i].append( + block_str % (r"\\".join(level_str[back_outer_i+1]))) + if len(level_str[back_outer_i+1]) == 1: + level_str[back_outer_i][-1] = r"\left[" + \ + level_str[back_outer_i][-1] + r"\right]" + even = not even + level_str[back_outer_i+1] = [] + + out_str = level_str[0][0] + + if expr.rank() % 2 == 1: + out_str = block_str % out_str + + return out_str + + def _printer_tensor_indices(self, name, indices, index_map: dict): + out_str = self._print(name) + last_valence = None + prev_map = None + for index in indices: + new_valence = index.is_up + if ((index in index_map) or prev_map) and \ + last_valence == new_valence: + out_str += "," + if last_valence != new_valence: + if last_valence is not None: + out_str += "}" + if index.is_up: + out_str += "{}^{" + else: + out_str += "{}_{" + out_str += self._print(index.args[0]) + if index in index_map: + out_str += "=" + out_str += self._print(index_map[index]) + prev_map = True + else: + prev_map = False + last_valence = new_valence + if last_valence is not None: + out_str += "}" + return out_str + + def _print_Tensor(self, expr): + name = expr.args[0].args[0] + indices = expr.get_indices() + return self._printer_tensor_indices(name, indices, {}) + + def _print_TensorElement(self, expr): + name = expr.expr.args[0].args[0] + indices = expr.expr.get_indices() + index_map = expr.index_map + return self._printer_tensor_indices(name, indices, index_map) + + def _print_TensMul(self, expr): + # prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)" + sign, args = expr._get_args_for_traditional_printer() + return sign + "".join( + [self.parenthesize(arg, precedence(expr)) for arg in args] + ) + + def _print_TensAdd(self, expr): + a = [] + args = expr.args + for x in args: + a.append(self.parenthesize(x, precedence(expr))) + a.sort() + s = ' + '.join(a) + s = s.replace('+ -', '- ') + return s + + def _print_TensorIndex(self, expr): + return "{}%s{%s}" % ( + "^" if expr.is_up else "_", + self._print(expr.args[0]) + ) + + def _print_PartialDerivative(self, expr): + if len(expr.variables) == 1: + return r"\frac{\partial}{\partial {%s}}{%s}" % ( + self._print(expr.variables[0]), + self.parenthesize(expr.expr, PRECEDENCE["Mul"], False) + ) + else: + return r"\frac{\partial^{%s}}{%s}{%s}" % ( + len(expr.variables), + " ".join([r"\partial {%s}" % self._print(i) for i in expr.variables]), + self.parenthesize(expr.expr, PRECEDENCE["Mul"], False) + ) + + def _print_ArraySymbol(self, expr): + return self._print(expr.name) + + def _print_ArrayElement(self, expr): + return "{{%s}_{%s}}" % ( + self.parenthesize(expr.name, PRECEDENCE["Func"], True), + ", ".join([f"{self._print(i)}" for i in expr.indices])) + + def _print_UniversalSet(self, expr): + return r"\mathbb{U}" + + def _print_frac(self, expr, exp=None): + if exp is None: + return r"\operatorname{frac}{\left(%s\right)}" % self._print(expr.args[0]) + else: + return r"\operatorname{frac}{\left(%s\right)}^{%s}" % ( + self._print(expr.args[0]), exp) + + def _print_tuple(self, expr): + if self._settings['decimal_separator'] == 'comma': + sep = ";" + elif self._settings['decimal_separator'] == 'period': + sep = "," + else: + raise ValueError('Unknown Decimal Separator') + + if len(expr) == 1: + # 1-tuple needs a trailing separator + return self._add_parens_lspace(self._print(expr[0]) + sep) + else: + return self._add_parens_lspace( + (sep + r" \ ").join([self._print(i) for i in expr])) + + def _print_TensorProduct(self, expr): + elements = [self._print(a) for a in expr.args] + return r' \otimes '.join(elements) + + def _print_WedgeProduct(self, expr): + elements = [self._print(a) for a in expr.args] + return r' \wedge '.join(elements) + + def _print_Tuple(self, expr): + return self._print_tuple(expr) + + def _print_list(self, expr): + if self._settings['decimal_separator'] == 'comma': + return r"\left[ %s\right]" % \ + r"; \ ".join([self._print(i) for i in expr]) + elif self._settings['decimal_separator'] == 'period': + return r"\left[ %s\right]" % \ + r", \ ".join([self._print(i) for i in expr]) + else: + raise ValueError('Unknown Decimal Separator') + + + def _print_dict(self, d): + keys = sorted(d.keys(), key=default_sort_key) + items = [] + + for key in keys: + val = d[key] + items.append("%s : %s" % (self._print(key), self._print(val))) + + return r"\left\{ %s\right\}" % r", \ ".join(items) + + def _print_Dict(self, expr): + return self._print_dict(expr) + + def _print_DiracDelta(self, expr, exp=None): + if len(expr.args) == 1 or expr.args[1] == 0: + tex = r"\delta\left(%s\right)" % self._print(expr.args[0]) + else: + tex = r"\delta^{\left( %s \right)}\left( %s \right)" % ( + self._print(expr.args[1]), self._print(expr.args[0])) + if exp: + tex = r"\left(%s\right)^{%s}" % (tex, exp) + return tex + + def _print_SingularityFunction(self, expr, exp=None): + shift = self._print(expr.args[0] - expr.args[1]) + power = self._print(expr.args[2]) + tex = r"{\left\langle %s \right\rangle}^{%s}" % (shift, power) + if exp is not None: + tex = r"{\left({\langle %s \rangle}^{%s}\right)}^{%s}" % (shift, power, exp) + return tex + + def _print_Heaviside(self, expr, exp=None): + pargs = ', '.join(self._print(arg) for arg in expr.pargs) + tex = r"\theta\left(%s\right)" % pargs + if exp: + tex = r"\left(%s\right)^{%s}" % (tex, exp) + return tex + + def _print_KroneckerDelta(self, expr, exp=None): + i = self._print(expr.args[0]) + j = self._print(expr.args[1]) + if expr.args[0].is_Atom and expr.args[1].is_Atom: + tex = r'\delta_{%s %s}' % (i, j) + else: + tex = r'\delta_{%s, %s}' % (i, j) + if exp is not None: + tex = r'\left(%s\right)^{%s}' % (tex, exp) + return tex + + def _print_LeviCivita(self, expr, exp=None): + indices = map(self._print, expr.args) + if all(x.is_Atom for x in expr.args): + tex = r'\varepsilon_{%s}' % " ".join(indices) + else: + tex = r'\varepsilon_{%s}' % ", ".join(indices) + if exp: + tex = r'\left(%s\right)^{%s}' % (tex, exp) + return tex + + def _print_RandomDomain(self, d): + if hasattr(d, 'as_boolean'): + return '\\text{Domain: }' + self._print(d.as_boolean()) + elif hasattr(d, 'set'): + return ('\\text{Domain: }' + self._print(d.symbols) + ' \\in ' + + self._print(d.set)) + elif hasattr(d, 'symbols'): + return '\\text{Domain on }' + self._print(d.symbols) + else: + return self._print(None) + + def _print_FiniteSet(self, s): + items = sorted(s.args, key=default_sort_key) + return self._print_set(items) + + def _print_set(self, s): + items = sorted(s, key=default_sort_key) + if self._settings['decimal_separator'] == 'comma': + items = "; ".join(map(self._print, items)) + elif self._settings['decimal_separator'] == 'period': + items = ", ".join(map(self._print, items)) + else: + raise ValueError('Unknown Decimal Separator') + return r"\left\{%s\right\}" % items + + + _print_frozenset = _print_set + + def _print_Range(self, s): + def _print_symbolic_range(): + # Symbolic Range that cannot be resolved + if s.args[0] == 0: + if s.args[2] == 1: + cont = self._print(s.args[1]) + else: + cont = ", ".join(self._print(arg) for arg in s.args) + else: + if s.args[2] == 1: + cont = ", ".join(self._print(arg) for arg in s.args[:2]) + else: + cont = ", ".join(self._print(arg) for arg in s.args) + + return(f"\\text{{Range}}\\left({cont}\\right)") + + dots = object() + + if s.start.is_infinite and s.stop.is_infinite: + if s.step.is_positive: + printset = dots, -1, 0, 1, dots + else: + printset = dots, 1, 0, -1, dots + elif s.start.is_infinite: + printset = dots, s[-1] - s.step, s[-1] + elif s.stop.is_infinite: + it = iter(s) + printset = next(it), next(it), dots + elif s.is_empty is not None: + if (s.size < 4) == True: + printset = tuple(s) + elif s.is_iterable: + it = iter(s) + printset = next(it), next(it), dots, s[-1] + else: + return _print_symbolic_range() + else: + return _print_symbolic_range() + return (r"\left\{" + + r", ".join(self._print(el) if el is not dots else r'\ldots' for el in printset) + + r"\right\}") + + def __print_number_polynomial(self, expr, letter, exp=None): + if len(expr.args) == 2: + if exp is not None: + return r"%s_{%s}^{%s}\left(%s\right)" % (letter, + self._print(expr.args[0]), exp, + self._print(expr.args[1])) + return r"%s_{%s}\left(%s\right)" % (letter, + self._print(expr.args[0]), self._print(expr.args[1])) + + tex = r"%s_{%s}" % (letter, self._print(expr.args[0])) + if exp is not None: + tex = r"%s^{%s}" % (tex, exp) + return tex + + def _print_bernoulli(self, expr, exp=None): + return self.__print_number_polynomial(expr, "B", exp) + + def _print_genocchi(self, expr, exp=None): + return self.__print_number_polynomial(expr, "G", exp) + + def _print_bell(self, expr, exp=None): + if len(expr.args) == 3: + tex1 = r"B_{%s, %s}" % (self._print(expr.args[0]), + self._print(expr.args[1])) + tex2 = r"\left(%s\right)" % r", ".join(self._print(el) for + el in expr.args[2]) + if exp is not None: + tex = r"%s^{%s}%s" % (tex1, exp, tex2) + else: + tex = tex1 + tex2 + return tex + return self.__print_number_polynomial(expr, "B", exp) + + def _print_fibonacci(self, expr, exp=None): + return self.__print_number_polynomial(expr, "F", exp) + + def _print_lucas(self, expr, exp=None): + tex = r"L_{%s}" % self._print(expr.args[0]) + if exp is not None: + tex = r"%s^{%s}" % (tex, exp) + return tex + + def _print_tribonacci(self, expr, exp=None): + return self.__print_number_polynomial(expr, "T", exp) + + def _print_mobius(self, expr, exp=None): + if exp is None: + return r'\mu\left(%s\right)' % self._print(expr.args[0]) + return r'\mu^{%s}\left(%s\right)' % (exp, self._print(expr.args[0])) + + def _print_SeqFormula(self, s): + dots = object() + if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0: + return r"\left\{%s\right\}_{%s=%s}^{%s}" % ( + self._print(s.formula), + self._print(s.variables[0]), + self._print(s.start), + self._print(s.stop) + ) + if s.start is S.NegativeInfinity: + stop = s.stop + printset = (dots, s.coeff(stop - 3), s.coeff(stop - 2), + s.coeff(stop - 1), s.coeff(stop)) + elif s.stop is S.Infinity or s.length > 4: + printset = s[:4] + printset.append(dots) + else: + printset = tuple(s) + + return (r"\left[" + + r", ".join(self._print(el) if el is not dots else r'\ldots' for el in printset) + + r"\right]") + + _print_SeqPer = _print_SeqFormula + _print_SeqAdd = _print_SeqFormula + _print_SeqMul = _print_SeqFormula + + def _print_Interval(self, i): + if i.start == i.end: + return r"\left\{%s\right\}" % self._print(i.start) + + else: + if i.left_open: + left = '(' + else: + left = '[' + + if i.right_open: + right = ')' + else: + right = ']' + + return r"\left%s%s, %s\right%s" % \ + (left, self._print(i.start), self._print(i.end), right) + + def _print_AccumulationBounds(self, i): + return r"\left\langle %s, %s\right\rangle" % \ + (self._print(i.min), self._print(i.max)) + + def _print_Union(self, u): + prec = precedence_traditional(u) + args_str = [self.parenthesize(i, prec) for i in u.args] + return r" \cup ".join(args_str) + + def _print_Complement(self, u): + prec = precedence_traditional(u) + args_str = [self.parenthesize(i, prec) for i in u.args] + return r" \setminus ".join(args_str) + + def _print_Intersection(self, u): + prec = precedence_traditional(u) + args_str = [self.parenthesize(i, prec) for i in u.args] + return r" \cap ".join(args_str) + + def _print_SymmetricDifference(self, u): + prec = precedence_traditional(u) + args_str = [self.parenthesize(i, prec) for i in u.args] + return r" \triangle ".join(args_str) + + def _print_ProductSet(self, p): + prec = precedence_traditional(p) + if len(p.sets) >= 1 and not has_variety(p.sets): + return self.parenthesize(p.sets[0], prec) + "^{%d}" % len(p.sets) + return r" \times ".join( + self.parenthesize(set, prec) for set in p.sets) + + def _print_EmptySet(self, e): + return r"\emptyset" + + def _print_Naturals(self, n): + return r"\mathbb{N}" + + def _print_Naturals0(self, n): + return r"\mathbb{N}_0" + + def _print_Integers(self, i): + return r"\mathbb{Z}" + + def _print_Rationals(self, i): + return r"\mathbb{Q}" + + def _print_Reals(self, i): + return r"\mathbb{R}" + + def _print_Complexes(self, i): + return r"\mathbb{C}" + + def _print_ImageSet(self, s): + expr = s.lamda.expr + sig = s.lamda.signature + xys = ((self._print(x), self._print(y)) for x, y in zip(sig, s.base_sets)) + xinys = r", ".join(r"%s \in %s" % xy for xy in xys) + return r"\left\{%s\; \middle|\; %s\right\}" % (self._print(expr), xinys) + + def _print_ConditionSet(self, s): + vars_print = ', '.join([self._print(var) for var in Tuple(s.sym)]) + if s.base_set is S.UniversalSet: + return r"\left\{%s\; \middle|\; %s \right\}" % \ + (vars_print, self._print(s.condition)) + + return r"\left\{%s\; \middle|\; %s \in %s \wedge %s \right\}" % ( + vars_print, + vars_print, + self._print(s.base_set), + self._print(s.condition)) + + def _print_PowerSet(self, expr): + arg_print = self._print(expr.args[0]) + return r"\mathcal{{P}}\left({}\right)".format(arg_print) + + def _print_ComplexRegion(self, s): + vars_print = ', '.join([self._print(var) for var in s.variables]) + return r"\left\{%s\; \middle|\; %s \in %s \right\}" % ( + self._print(s.expr), + vars_print, + self._print(s.sets)) + + def _print_Contains(self, e): + return r"%s \in %s" % tuple(self._print(a) for a in e.args) + + def _print_FourierSeries(self, s): + if s.an.formula is S.Zero and s.bn.formula is S.Zero: + return self._print(s.a0) + return self._print_Add(s.truncate()) + r' + \ldots' + + def _print_FormalPowerSeries(self, s): + return self._print_Add(s.infinite) + + def _print_FiniteField(self, expr): + return r"\mathbb{F}_{%s}" % expr.mod + + def _print_IntegerRing(self, expr): + return r"\mathbb{Z}" + + def _print_RationalField(self, expr): + return r"\mathbb{Q}" + + def _print_RealField(self, expr): + return r"\mathbb{R}" + + def _print_ComplexField(self, expr): + return r"\mathbb{C}" + + def _print_PolynomialRing(self, expr): + domain = self._print(expr.domain) + symbols = ", ".join(map(self._print, expr.symbols)) + return r"%s\left[%s\right]" % (domain, symbols) + + def _print_FractionField(self, expr): + domain = self._print(expr.domain) + symbols = ", ".join(map(self._print, expr.symbols)) + return r"%s\left(%s\right)" % (domain, symbols) + + def _print_PolynomialRingBase(self, expr): + domain = self._print(expr.domain) + symbols = ", ".join(map(self._print, expr.symbols)) + inv = "" + if not expr.is_Poly: + inv = r"S_<^{-1}" + return r"%s%s\left[%s\right]" % (inv, domain, symbols) + + def _print_Poly(self, poly): + cls = poly.__class__.__name__ + terms = [] + for monom, coeff in poly.terms(): + s_monom = '' + for i, exp in enumerate(monom): + if exp > 0: + if exp == 1: + s_monom += self._print(poly.gens[i]) + else: + s_monom += self._print(pow(poly.gens[i], exp)) + + if coeff.is_Add: + if s_monom: + s_coeff = r"\left(%s\right)" % self._print(coeff) + else: + s_coeff = self._print(coeff) + else: + if s_monom: + if coeff is S.One: + terms.extend(['+', s_monom]) + continue + + if coeff is S.NegativeOne: + terms.extend(['-', s_monom]) + continue + + s_coeff = self._print(coeff) + + if not s_monom: + s_term = s_coeff + else: + s_term = s_coeff + " " + s_monom + + if s_term.startswith('-'): + terms.extend(['-', s_term[1:]]) + else: + terms.extend(['+', s_term]) + + if terms[0] in ('-', '+'): + modifier = terms.pop(0) + + if modifier == '-': + terms[0] = '-' + terms[0] + + expr = ' '.join(terms) + gens = list(map(self._print, poly.gens)) + domain = "domain=%s" % self._print(poly.get_domain()) + + args = ", ".join([expr] + gens + [domain]) + if cls in accepted_latex_functions: + tex = r"\%s {\left(%s \right)}" % (cls, args) + else: + tex = r"\operatorname{%s}{\left( %s \right)}" % (cls, args) + + return tex + + def _print_ComplexRootOf(self, root): + cls = root.__class__.__name__ + if cls == "ComplexRootOf": + cls = "CRootOf" + expr = self._print(root.expr) + index = root.index + if cls in accepted_latex_functions: + return r"\%s {\left(%s, %d\right)}" % (cls, expr, index) + else: + return r"\operatorname{%s} {\left(%s, %d\right)}" % (cls, expr, + index) + + def _print_RootSum(self, expr): + cls = expr.__class__.__name__ + args = [self._print(expr.expr)] + + if expr.fun is not S.IdentityFunction: + args.append(self._print(expr.fun)) + + if cls in accepted_latex_functions: + return r"\%s {\left(%s\right)}" % (cls, ", ".join(args)) + else: + return r"\operatorname{%s} {\left(%s\right)}" % (cls, + ", ".join(args)) + + def _print_OrdinalOmega(self, expr): + return r"\omega" + + def _print_OmegaPower(self, expr): + exp, mul = expr.args + if mul != 1: + if exp != 1: + return r"{} \omega^{{{}}}".format(mul, exp) + else: + return r"{} \omega".format(mul) + else: + if exp != 1: + return r"\omega^{{{}}}".format(exp) + else: + return r"\omega" + + def _print_Ordinal(self, expr): + return " + ".join([self._print(arg) for arg in expr.args]) + + def _print_PolyElement(self, poly): + mul_symbol = self._settings['mul_symbol_latex'] + return poly.str(self, PRECEDENCE, "{%s}^{%d}", mul_symbol) + + def _print_FracElement(self, frac): + if frac.denom == 1: + return self._print(frac.numer) + else: + numer = self._print(frac.numer) + denom = self._print(frac.denom) + return r"\frac{%s}{%s}" % (numer, denom) + + def _print_euler(self, expr, exp=None): + m, x = (expr.args[0], None) if len(expr.args) == 1 else expr.args + tex = r"E_{%s}" % self._print(m) + if exp is not None: + tex = r"%s^{%s}" % (tex, exp) + if x is not None: + tex = r"%s\left(%s\right)" % (tex, self._print(x)) + return tex + + def _print_catalan(self, expr, exp=None): + tex = r"C_{%s}" % self._print(expr.args[0]) + if exp is not None: + tex = r"%s^{%s}" % (tex, exp) + return tex + + def _print_UnifiedTransform(self, expr, s, inverse=False): + return r"\mathcal{{{}}}{}_{{{}}}\left[{}\right]\left({}\right)".format(s, '^{-1}' if inverse else '', self._print(expr.args[1]), self._print(expr.args[0]), self._print(expr.args[2])) + + def _print_MellinTransform(self, expr): + return self._print_UnifiedTransform(expr, 'M') + + def _print_InverseMellinTransform(self, expr): + return self._print_UnifiedTransform(expr, 'M', True) + + def _print_LaplaceTransform(self, expr): + return self._print_UnifiedTransform(expr, 'L') + + def _print_InverseLaplaceTransform(self, expr): + return self._print_UnifiedTransform(expr, 'L', True) + + def _print_FourierTransform(self, expr): + return self._print_UnifiedTransform(expr, 'F') + + def _print_InverseFourierTransform(self, expr): + return self._print_UnifiedTransform(expr, 'F', True) + + def _print_SineTransform(self, expr): + return self._print_UnifiedTransform(expr, 'SIN') + + def _print_InverseSineTransform(self, expr): + return self._print_UnifiedTransform(expr, 'SIN', True) + + def _print_CosineTransform(self, expr): + return self._print_UnifiedTransform(expr, 'COS') + + def _print_InverseCosineTransform(self, expr): + return self._print_UnifiedTransform(expr, 'COS', True) + + def _print_DMP(self, p): + try: + if p.ring is not None: + # TODO incorporate order + return self._print(p.ring.to_sympy(p)) + except SympifyError: + pass + return self._print(repr(p)) + + def _print_DMF(self, p): + return self._print_DMP(p) + + def _print_Object(self, object): + return self._print(Symbol(object.name)) + + def _print_LambertW(self, expr, exp=None): + arg0 = self._print(expr.args[0]) + exp = r"^{%s}" % (exp,) if exp is not None else "" + if len(expr.args) == 1: + result = r"W%s\left(%s\right)" % (exp, arg0) + else: + arg1 = self._print(expr.args[1]) + result = "W{0}_{{{1}}}\\left({2}\\right)".format(exp, arg1, arg0) + return result + + def _print_Expectation(self, expr): + return r"\operatorname{{E}}\left[{}\right]".format(self._print(expr.args[0])) + + def _print_Variance(self, expr): + return r"\operatorname{{Var}}\left({}\right)".format(self._print(expr.args[0])) + + def _print_Covariance(self, expr): + return r"\operatorname{{Cov}}\left({}\right)".format(", ".join(self._print(arg) for arg in expr.args)) + + def _print_Probability(self, expr): + return r"\operatorname{{P}}\left({}\right)".format(self._print(expr.args[0])) + + def _print_Morphism(self, morphism): + domain = self._print(morphism.domain) + codomain = self._print(morphism.codomain) + return "%s\\rightarrow %s" % (domain, codomain) + + def _print_TransferFunction(self, expr): + num, den = self._print(expr.num), self._print(expr.den) + return r"\frac{%s}{%s}" % (num, den) + + def _print_Series(self, expr): + args = list(expr.args) + parens = lambda x: self.parenthesize(x, precedence_traditional(expr), + False) + return ' '.join(map(parens, args)) + + def _print_MIMOSeries(self, expr): + from sympy.physics.control.lti import MIMOParallel + args = list(expr.args)[::-1] + parens = lambda x: self.parenthesize(x, precedence_traditional(expr), + False) if isinstance(x, MIMOParallel) else self._print(x) + return r"\cdot".join(map(parens, args)) + + def _print_Parallel(self, expr): + return ' + '.join(map(self._print, expr.args)) + + def _print_MIMOParallel(self, expr): + return ' + '.join(map(self._print, expr.args)) + + def _print_Feedback(self, expr): + from sympy.physics.control import TransferFunction, Series + + num, tf = expr.sys1, TransferFunction(1, 1, expr.var) + num_arg_list = list(num.args) if isinstance(num, Series) else [num] + den_arg_list = list(expr.sys2.args) if \ + isinstance(expr.sys2, Series) else [expr.sys2] + den_term_1 = tf + + if isinstance(num, Series) and isinstance(expr.sys2, Series): + den_term_2 = Series(*num_arg_list, *den_arg_list) + elif isinstance(num, Series) and isinstance(expr.sys2, TransferFunction): + if expr.sys2 == tf: + den_term_2 = Series(*num_arg_list) + else: + den_term_2 = tf, Series(*num_arg_list, expr.sys2) + elif isinstance(num, TransferFunction) and isinstance(expr.sys2, Series): + if num == tf: + den_term_2 = Series(*den_arg_list) + else: + den_term_2 = Series(num, *den_arg_list) + else: + if num == tf: + den_term_2 = Series(*den_arg_list) + elif expr.sys2 == tf: + den_term_2 = Series(*num_arg_list) + else: + den_term_2 = Series(*num_arg_list, *den_arg_list) + + numer = self._print(num) + denom_1 = self._print(den_term_1) + denom_2 = self._print(den_term_2) + _sign = "+" if expr.sign == -1 else "-" + + return r"\frac{%s}{%s %s %s}" % (numer, denom_1, _sign, denom_2) + + def _print_MIMOFeedback(self, expr): + from sympy.physics.control import MIMOSeries + inv_mat = self._print(MIMOSeries(expr.sys2, expr.sys1)) + sys1 = self._print(expr.sys1) + _sign = "+" if expr.sign == -1 else "-" + return r"\left(I_{\tau} %s %s\right)^{-1} \cdot %s" % (_sign, inv_mat, sys1) + + def _print_TransferFunctionMatrix(self, expr): + mat = self._print(expr._expr_mat) + return r"%s_\tau" % mat + + def _print_DFT(self, expr): + return r"\text{{{}}}_{{{}}}".format(expr.__class__.__name__, expr.n) + _print_IDFT = _print_DFT + + def _print_NamedMorphism(self, morphism): + pretty_name = self._print(Symbol(morphism.name)) + pretty_morphism = self._print_Morphism(morphism) + return "%s:%s" % (pretty_name, pretty_morphism) + + def _print_IdentityMorphism(self, morphism): + from sympy.categories import NamedMorphism + return self._print_NamedMorphism(NamedMorphism( + morphism.domain, morphism.codomain, "id")) + + def _print_CompositeMorphism(self, morphism): + # All components of the morphism have names and it is thus + # possible to build the name of the composite. + component_names_list = [self._print(Symbol(component.name)) for + component in morphism.components] + component_names_list.reverse() + component_names = "\\circ ".join(component_names_list) + ":" + + pretty_morphism = self._print_Morphism(morphism) + return component_names + pretty_morphism + + def _print_Category(self, morphism): + return r"\mathbf{{{}}}".format(self._print(Symbol(morphism.name))) + + def _print_Diagram(self, diagram): + if not diagram.premises: + # This is an empty diagram. + return self._print(S.EmptySet) + + latex_result = self._print(diagram.premises) + if diagram.conclusions: + latex_result += "\\Longrightarrow %s" % \ + self._print(diagram.conclusions) + + return latex_result + + def _print_DiagramGrid(self, grid): + latex_result = "\\begin{array}{%s}\n" % ("c" * grid.width) + + for i in range(grid.height): + for j in range(grid.width): + if grid[i, j]: + latex_result += latex(grid[i, j]) + latex_result += " " + if j != grid.width - 1: + latex_result += "& " + + if i != grid.height - 1: + latex_result += "\\\\" + latex_result += "\n" + + latex_result += "\\end{array}\n" + return latex_result + + def _print_FreeModule(self, M): + return '{{{}}}^{{{}}}'.format(self._print(M.ring), self._print(M.rank)) + + def _print_FreeModuleElement(self, m): + # Print as row vector for convenience, for now. + return r"\left[ {} \right]".format(",".join( + '{' + self._print(x) + '}' for x in m)) + + def _print_SubModule(self, m): + gens = [[self._print(m.ring.to_sympy(x)) for x in g] for g in m.gens] + curly = lambda o: r"{" + o + r"}" + square = lambda o: r"\left[ " + o + r" \right]" + gens_latex = ",".join(curly(square(",".join(curly(x) for x in g))) for g in gens) + return r"\left\langle {} \right\rangle".format(gens_latex) + + def _print_SubQuotientModule(self, m): + gens_latex = ",".join(["{" + self._print(g) + "}" for g in m.gens]) + return r"\left\langle {} \right\rangle".format(gens_latex) + + def _print_ModuleImplementedIdeal(self, m): + gens = [m.ring.to_sympy(x) for [x] in m._module.gens] + gens_latex = ",".join('{' + self._print(x) + '}' for x in gens) + return r"\left\langle {} \right\rangle".format(gens_latex) + + def _print_Quaternion(self, expr): + # TODO: This expression is potentially confusing, + # shall we print it as `Quaternion( ... )`? + s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) + for i in expr.args] + a = [s[0]] + [i+" "+j for i, j in zip(s[1:], "ijk")] + return " + ".join(a) + + def _print_QuotientRing(self, R): + # TODO nicer fractions for few generators... + return r"\frac{{{}}}{{{}}}".format(self._print(R.ring), + self._print(R.base_ideal)) + + def _print_QuotientRingElement(self, x): + x_latex = self._print(x.ring.to_sympy(x)) + return r"{{{}}} + {{{}}}".format(x_latex, + self._print(x.ring.base_ideal)) + + def _print_QuotientModuleElement(self, m): + data = [m.module.ring.to_sympy(x) for x in m.data] + data_latex = r"\left[ {} \right]".format(",".join( + '{' + self._print(x) + '}' for x in data)) + return r"{{{}}} + {{{}}}".format(data_latex, + self._print(m.module.killed_module)) + + def _print_QuotientModule(self, M): + # TODO nicer fractions for few generators... + return r"\frac{{{}}}{{{}}}".format(self._print(M.base), + self._print(M.killed_module)) + + def _print_MatrixHomomorphism(self, h): + return r"{{{}}} : {{{}}} \to {{{}}}".format(self._print(h._sympy_matrix()), + self._print(h.domain), self._print(h.codomain)) + + def _print_Manifold(self, manifold): + name, supers, subs = self._split_super_sub(manifold.name.name) + + name = r'\text{%s}' % name + if supers: + name += "^{%s}" % " ".join(supers) + if subs: + name += "_{%s}" % " ".join(subs) + + return name + + def _print_Patch(self, patch): + return r'\text{%s}_{%s}' % (self._print(patch.name), self._print(patch.manifold)) + + def _print_CoordSystem(self, coordsys): + return r'\text{%s}^{\text{%s}}_{%s}' % ( + self._print(coordsys.name), self._print(coordsys.patch.name), self._print(coordsys.manifold) + ) + + def _print_CovarDerivativeOp(self, cvd): + return r'\mathbb{\nabla}_{%s}' % self._print(cvd._wrt) + + def _print_BaseScalarField(self, field): + string = field._coord_sys.symbols[field._index].name + return r'\mathbf{{{}}}'.format(self._print(Symbol(string))) + + def _print_BaseVectorField(self, field): + string = field._coord_sys.symbols[field._index].name + return r'\partial_{{{}}}'.format(self._print(Symbol(string))) + + def _print_Differential(self, diff): + field = diff._form_field + if hasattr(field, '_coord_sys'): + string = field._coord_sys.symbols[field._index].name + return r'\operatorname{{d}}{}'.format(self._print(Symbol(string))) + else: + string = self._print(field) + return r'\operatorname{{d}}\left({}\right)'.format(string) + + def _print_Tr(self, p): + # TODO: Handle indices + contents = self._print(p.args[0]) + return r'\operatorname{{tr}}\left({}\right)'.format(contents) + + def _print_totient(self, expr, exp=None): + if exp is not None: + return r'\left(\phi\left(%s\right)\right)^{%s}' % \ + (self._print(expr.args[0]), exp) + return r'\phi\left(%s\right)' % self._print(expr.args[0]) + + def _print_reduced_totient(self, expr, exp=None): + if exp is not None: + return r'\left(\lambda\left(%s\right)\right)^{%s}' % \ + (self._print(expr.args[0]), exp) + return r'\lambda\left(%s\right)' % self._print(expr.args[0]) + + def _print_divisor_sigma(self, expr, exp=None): + if len(expr.args) == 2: + tex = r"_%s\left(%s\right)" % tuple(map(self._print, + (expr.args[1], expr.args[0]))) + else: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"\sigma^{%s}%s" % (exp, tex) + return r"\sigma%s" % tex + + def _print_udivisor_sigma(self, expr, exp=None): + if len(expr.args) == 2: + tex = r"_%s\left(%s\right)" % tuple(map(self._print, + (expr.args[1], expr.args[0]))) + else: + tex = r"\left(%s\right)" % self._print(expr.args[0]) + if exp is not None: + return r"\sigma^*^{%s}%s" % (exp, tex) + return r"\sigma^*%s" % tex + + def _print_primenu(self, expr, exp=None): + if exp is not None: + return r'\left(\nu\left(%s\right)\right)^{%s}' % \ + (self._print(expr.args[0]), exp) + return r'\nu\left(%s\right)' % self._print(expr.args[0]) + + def _print_primeomega(self, expr, exp=None): + if exp is not None: + return r'\left(\Omega\left(%s\right)\right)^{%s}' % \ + (self._print(expr.args[0]), exp) + return r'\Omega\left(%s\right)' % self._print(expr.args[0]) + + def _print_Str(self, s): + return str(s.name) + + def _print_float(self, expr): + return self._print(Float(expr)) + + def _print_int(self, expr): + return str(expr) + + def _print_mpz(self, expr): + return str(expr) + + def _print_mpq(self, expr): + return str(expr) + + def _print_fmpz(self, expr): + return str(expr) + + def _print_fmpq(self, expr): + return str(expr) + + def _print_Predicate(self, expr): + return r"\operatorname{{Q}}_{{\text{{{}}}}}".format(latex_escape(str(expr.name))) + + def _print_AppliedPredicate(self, expr): + pred = expr.function + args = expr.arguments + pred_latex = self._print(pred) + args_latex = ', '.join([self._print(a) for a in args]) + return '%s(%s)' % (pred_latex, args_latex) + + def emptyPrinter(self, expr): + # default to just printing as monospace, like would normally be shown + s = super().emptyPrinter(expr) + + return r"\mathtt{\text{%s}}" % latex_escape(s) + + +def translate(s: str) -> str: + r''' + Check for a modifier ending the string. If present, convert the + modifier to latex and translate the rest recursively. + + Given a description of a Greek letter or other special character, + return the appropriate latex. + + Let everything else pass as given. + + >>> from sympy.printing.latex import translate + >>> translate('alphahatdotprime') + "{\\dot{\\hat{\\alpha}}}'" + ''' + # Process the rest + tex = tex_greek_dictionary.get(s) + if tex: + return tex + elif s.lower() in greek_letters_set: + return "\\" + s.lower() + elif s in other_symbols: + return "\\" + s + else: + # Process modifiers, if any, and recurse + for key in sorted(modifier_dict.keys(), key=len, reverse=True): + if s.lower().endswith(key) and len(s) > len(key): + return modifier_dict[key](translate(s[:-len(key)])) + return s + + + +@print_function(LatexPrinter) +def latex(expr, **settings): + r"""Convert the given expression to LaTeX string representation. + + Parameters + ========== + full_prec: boolean, optional + If set to True, a floating point number is printed with full precision. + fold_frac_powers : boolean, optional + Emit ``^{p/q}`` instead of ``^{\frac{p}{q}}`` for fractional powers. + fold_func_brackets : boolean, optional + Fold function brackets where applicable. + fold_short_frac : boolean, optional + Emit ``p / q`` instead of ``\frac{p}{q}`` when the denominator is + simple enough (at most two terms and no powers). The default value is + ``True`` for inline mode, ``False`` otherwise. + inv_trig_style : string, optional + How inverse trig functions should be displayed. Can be one of + ``'abbreviated'``, ``'full'``, or ``'power'``. Defaults to + ``'abbreviated'``. + itex : boolean, optional + Specifies if itex-specific syntax is used, including emitting + ``$$...$$``. + ln_notation : boolean, optional + If set to ``True``, ``\ln`` is used instead of default ``\log``. + long_frac_ratio : float or None, optional + The allowed ratio of the width of the numerator to the width of the + denominator before the printer breaks off long fractions. If ``None`` + (the default value), long fractions are not broken up. + mat_delim : string, optional + The delimiter to wrap around matrices. Can be one of ``'['``, ``'('``, + or the empty string ``''``. Defaults to ``'['``. + mat_str : string, optional + Which matrix environment string to emit. ``'smallmatrix'``, + ``'matrix'``, ``'array'``, etc. Defaults to ``'smallmatrix'`` for + inline mode, ``'matrix'`` for matrices of no more than 10 columns, and + ``'array'`` otherwise. + mode: string, optional + Specifies how the generated code will be delimited. ``mode`` can be one + of ``'plain'``, ``'inline'``, ``'equation'`` or ``'equation*'``. If + ``mode`` is set to ``'plain'``, then the resulting code will not be + delimited at all (this is the default). If ``mode`` is set to + ``'inline'`` then inline LaTeX ``$...$`` will be used. If ``mode`` is + set to ``'equation'`` or ``'equation*'``, the resulting code will be + enclosed in the ``equation`` or ``equation*`` environment (remember to + import ``amsmath`` for ``equation*``), unless the ``itex`` option is + set. In the latter case, the ``$$...$$`` syntax is used. + mul_symbol : string or None, optional + The symbol to use for multiplication. Can be one of ``None``, + ``'ldot'``, ``'dot'``, or ``'times'``. + order: string, optional + Any of the supported monomial orderings (currently ``'lex'``, + ``'grlex'``, or ``'grevlex'``), ``'old'``, and ``'none'``. This + parameter does nothing for `~.Mul` objects. Setting order to ``'old'`` + uses the compatibility ordering for ``~.Add`` defined in Printer. For + very large expressions, set the ``order`` keyword to ``'none'`` if + speed is a concern. + symbol_names : dictionary of strings mapped to symbols, optional + Dictionary of symbols and the custom strings they should be emitted as. + root_notation : boolean, optional + If set to ``False``, exponents of the form 1/n are printed in fractonal + form. Default is ``True``, to print exponent in root form. + mat_symbol_style : string, optional + Can be either ``'plain'`` (default) or ``'bold'``. If set to + ``'bold'``, a `~.MatrixSymbol` A will be printed as ``\mathbf{A}``, + otherwise as ``A``. + imaginary_unit : string, optional + String to use for the imaginary unit. Defined options are ``'i'`` + (default) and ``'j'``. Adding ``r`` or ``t`` in front gives ``\mathrm`` + or ``\text``, so ``'ri'`` leads to ``\mathrm{i}`` which gives + `\mathrm{i}`. + gothic_re_im : boolean, optional + If set to ``True``, `\Re` and `\Im` is used for ``re`` and ``im``, respectively. + The default is ``False`` leading to `\operatorname{re}` and `\operatorname{im}`. + decimal_separator : string, optional + Specifies what separator to use to separate the whole and fractional parts of a + floating point number as in `2.5` for the default, ``period`` or `2{,}5` + when ``comma`` is specified. Lists, sets, and tuple are printed with semicolon + separating the elements when ``comma`` is chosen. For example, [1; 2; 3] when + ``comma`` is chosen and [1,2,3] for when ``period`` is chosen. + parenthesize_super : boolean, optional + If set to ``False``, superscripted expressions will not be parenthesized when + powered. Default is ``True``, which parenthesizes the expression when powered. + min: Integer or None, optional + Sets the lower bound for the exponent to print floating point numbers in + fixed-point format. + max: Integer or None, optional + Sets the upper bound for the exponent to print floating point numbers in + fixed-point format. + diff_operator: string, optional + String to use for differential operator. Default is ``'d'``, to print in italic + form. ``'rd'``, ``'td'`` are shortcuts for ``\mathrm{d}`` and ``\text{d}``. + adjoint_style: string, optional + String to use for the adjoint symbol. Defined options are ``'dagger'`` + (default),``'star'``, and ``'hermitian'``. + + Notes + ===== + + Not using a print statement for printing, results in double backslashes for + latex commands since that's the way Python escapes backslashes in strings. + + >>> from sympy import latex, Rational + >>> from sympy.abc import tau + >>> latex((2*tau)**Rational(7,2)) + '8 \\sqrt{2} \\tau^{\\frac{7}{2}}' + >>> print(latex((2*tau)**Rational(7,2))) + 8 \sqrt{2} \tau^{\frac{7}{2}} + + Examples + ======== + + >>> from sympy import latex, pi, sin, asin, Integral, Matrix, Rational, log + >>> from sympy.abc import x, y, mu, r, tau + + Basic usage: + + >>> print(latex((2*tau)**Rational(7,2))) + 8 \sqrt{2} \tau^{\frac{7}{2}} + + ``mode`` and ``itex`` options: + + >>> print(latex((2*mu)**Rational(7,2), mode='plain')) + 8 \sqrt{2} \mu^{\frac{7}{2}} + >>> print(latex((2*tau)**Rational(7,2), mode='inline')) + $8 \sqrt{2} \tau^{7 / 2}$ + >>> print(latex((2*mu)**Rational(7,2), mode='equation*')) + \begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*} + >>> print(latex((2*mu)**Rational(7,2), mode='equation')) + \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} + >>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True)) + $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ + >>> print(latex((2*mu)**Rational(7,2), mode='plain')) + 8 \sqrt{2} \mu^{\frac{7}{2}} + >>> print(latex((2*tau)**Rational(7,2), mode='inline')) + $8 \sqrt{2} \tau^{7 / 2}$ + >>> print(latex((2*mu)**Rational(7,2), mode='equation*')) + \begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*} + >>> print(latex((2*mu)**Rational(7,2), mode='equation')) + \begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation} + >>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True)) + $$8 \sqrt{2} \mu^{\frac{7}{2}}$$ + + Fraction options: + + >>> print(latex((2*tau)**Rational(7,2), fold_frac_powers=True)) + 8 \sqrt{2} \tau^{7/2} + >>> print(latex((2*tau)**sin(Rational(7,2)))) + \left(2 \tau\right)^{\sin{\left(\frac{7}{2} \right)}} + >>> print(latex((2*tau)**sin(Rational(7,2)), fold_func_brackets=True)) + \left(2 \tau\right)^{\sin {\frac{7}{2}}} + >>> print(latex(3*x**2/y)) + \frac{3 x^{2}}{y} + >>> print(latex(3*x**2/y, fold_short_frac=True)) + 3 x^{2} / y + >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=2)) + \frac{\int r\, dr}{2 \pi} + >>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=0)) + \frac{1}{2 \pi} \int r\, dr + + Multiplication options: + + >>> print(latex((2*tau)**sin(Rational(7,2)), mul_symbol="times")) + \left(2 \times \tau\right)^{\sin{\left(\frac{7}{2} \right)}} + + Trig options: + + >>> print(latex(asin(Rational(7,2)))) + \operatorname{asin}{\left(\frac{7}{2} \right)} + >>> print(latex(asin(Rational(7,2)), inv_trig_style="full")) + \arcsin{\left(\frac{7}{2} \right)} + >>> print(latex(asin(Rational(7,2)), inv_trig_style="power")) + \sin^{-1}{\left(\frac{7}{2} \right)} + + Matrix options: + + >>> print(latex(Matrix(2, 1, [x, y]))) + \left[\begin{matrix}x\\y\end{matrix}\right] + >>> print(latex(Matrix(2, 1, [x, y]), mat_str = "array")) + \left[\begin{array}{c}x\\y\end{array}\right] + >>> print(latex(Matrix(2, 1, [x, y]), mat_delim="(")) + \left(\begin{matrix}x\\y\end{matrix}\right) + + Custom printing of symbols: + + >>> print(latex(x**2, symbol_names={x: 'x_i'})) + x_i^{2} + + Logarithms: + + >>> print(latex(log(10))) + \log{\left(10 \right)} + >>> print(latex(log(10), ln_notation=True)) + \ln{\left(10 \right)} + + ``latex()`` also supports the builtin container types :class:`list`, + :class:`tuple`, and :class:`dict`: + + >>> print(latex([2/x, y], mode='inline')) + $\left[ 2 / x, \ y\right]$ + + Unsupported types are rendered as monospaced plaintext: + + >>> print(latex(int)) + \mathtt{\text{}} + >>> print(latex("plain % text")) + \mathtt{\text{plain \% text}} + + See :ref:`printer_method_example` for an example of how to override + this behavior for your own types by implementing ``_latex``. + + .. versionchanged:: 1.7.0 + Unsupported types no longer have their ``str`` representation treated as valid latex. + + """ + return LatexPrinter(settings).doprint(expr) + + +def print_latex(expr, **settings): + """Prints LaTeX representation of the given expression. Takes the same + settings as ``latex()``.""" + + print(latex(expr, **settings)) + + +def multiline_latex(lhs, rhs, terms_per_line=1, environment="align*", use_dots=False, **settings): + r""" + This function generates a LaTeX equation with a multiline right-hand side + in an ``align*``, ``eqnarray`` or ``IEEEeqnarray`` environment. + + Parameters + ========== + + lhs : Expr + Left-hand side of equation + + rhs : Expr + Right-hand side of equation + + terms_per_line : integer, optional + Number of terms per line to print. Default is 1. + + environment : "string", optional + Which LaTeX wnvironment to use for the output. Options are "align*" + (default), "eqnarray", and "IEEEeqnarray". + + use_dots : boolean, optional + If ``True``, ``\\dots`` is added to the end of each line. Default is ``False``. + + Examples + ======== + + >>> from sympy import multiline_latex, symbols, sin, cos, exp, log, I + >>> x, y, alpha = symbols('x y alpha') + >>> expr = sin(alpha*y) + exp(I*alpha) - cos(log(y)) + >>> print(multiline_latex(x, expr)) + \begin{align*} + x = & e^{i \alpha} \\ + & + \sin{\left(\alpha y \right)} \\ + & - \cos{\left(\log{\left(y \right)} \right)} + \end{align*} + + Using at most two terms per line: + >>> print(multiline_latex(x, expr, 2)) + \begin{align*} + x = & e^{i \alpha} + \sin{\left(\alpha y \right)} \\ + & - \cos{\left(\log{\left(y \right)} \right)} + \end{align*} + + Using ``eqnarray`` and dots: + >>> print(multiline_latex(x, expr, terms_per_line=2, environment="eqnarray", use_dots=True)) + \begin{eqnarray} + x & = & e^{i \alpha} + \sin{\left(\alpha y \right)} \dots\nonumber\\ + & & - \cos{\left(\log{\left(y \right)} \right)} + \end{eqnarray} + + Using ``IEEEeqnarray``: + >>> print(multiline_latex(x, expr, environment="IEEEeqnarray")) + \begin{IEEEeqnarray}{rCl} + x & = & e^{i \alpha} \nonumber\\ + & & + \sin{\left(\alpha y \right)} \nonumber\\ + & & - \cos{\left(\log{\left(y \right)} \right)} + \end{IEEEeqnarray} + + Notes + ===== + + All optional parameters from ``latex`` can also be used. + + """ + + # Based on code from https://github.com/sympy/sympy/issues/3001 + l = LatexPrinter(**settings) + if environment == "eqnarray": + result = r'\begin{eqnarray}' + '\n' + first_term = '& = &' + nonumber = r'\nonumber' + end_term = '\n\\end{eqnarray}' + doubleet = True + elif environment == "IEEEeqnarray": + result = r'\begin{IEEEeqnarray}{rCl}' + '\n' + first_term = '& = &' + nonumber = r'\nonumber' + end_term = '\n\\end{IEEEeqnarray}' + doubleet = True + elif environment == "align*": + result = r'\begin{align*}' + '\n' + first_term = '= &' + nonumber = '' + end_term = '\n\\end{align*}' + doubleet = False + else: + raise ValueError("Unknown environment: {}".format(environment)) + dots = '' + if use_dots: + dots=r'\dots' + terms = rhs.as_ordered_terms() + n_terms = len(terms) + term_count = 1 + for i in range(n_terms): + term = terms[i] + term_start = '' + term_end = '' + sign = '+' + if term_count > terms_per_line: + if doubleet: + term_start = '& & ' + else: + term_start = '& ' + term_count = 1 + if term_count == terms_per_line: + # End of line + if i < n_terms-1: + # There are terms remaining + term_end = dots + nonumber + r'\\' + '\n' + else: + term_end = '' + + if term.as_ordered_factors()[0] == -1: + term = -1*term + sign = r'-' + if i == 0: # beginning + if sign == '+': + sign = '' + result += r'{:s} {:s}{:s} {:s} {:s}'.format(l.doprint(lhs), + first_term, sign, l.doprint(term), term_end) + else: + result += r'{:s}{:s} {:s} {:s}'.format(term_start, sign, + l.doprint(term), term_end) + term_count += 1 + result += end_term + return result diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/llvmjitcode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/llvmjitcode.py new file mode 100644 index 0000000000000000000000000000000000000000..0e657f3b854be62fb4b6b4be96f82579b718f6ca --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/llvmjitcode.py @@ -0,0 +1,490 @@ +''' +Use llvmlite to create executable functions from SymPy expressions + +This module requires llvmlite (https://github.com/numba/llvmlite). +''' + +import ctypes + +from sympy.external import import_module +from sympy.printing.printer import Printer +from sympy.core.singleton import S +from sympy.tensor.indexed import IndexedBase +from sympy.utilities.decorator import doctest_depends_on + +llvmlite = import_module('llvmlite') +if llvmlite: + ll = import_module('llvmlite.ir').ir + llvm = import_module('llvmlite.binding').binding + llvm.initialize() + llvm.initialize_native_target() + llvm.initialize_native_asmprinter() + + +__doctest_requires__ = {('llvm_callable'): ['llvmlite']} + + +class LLVMJitPrinter(Printer): + '''Convert expressions to LLVM IR''' + def __init__(self, module, builder, fn, *args, **kwargs): + self.func_arg_map = kwargs.pop("func_arg_map", {}) + if not llvmlite: + raise ImportError("llvmlite is required for LLVMJITPrinter") + super().__init__(*args, **kwargs) + self.fp_type = ll.DoubleType() + self.module = module + self.builder = builder + self.fn = fn + self.ext_fn = {} # keep track of wrappers to external functions + self.tmp_var = {} + + def _add_tmp_var(self, name, value): + self.tmp_var[name] = value + + def _print_Number(self, n): + return ll.Constant(self.fp_type, float(n)) + + def _print_Integer(self, expr): + return ll.Constant(self.fp_type, float(expr.p)) + + def _print_Symbol(self, s): + val = self.tmp_var.get(s) + if not val: + # look up parameter with name s + val = self.func_arg_map.get(s) + if not val: + raise LookupError("Symbol not found: %s" % s) + return val + + def _print_Pow(self, expr): + base0 = self._print(expr.base) + if expr.exp == S.NegativeOne: + return self.builder.fdiv(ll.Constant(self.fp_type, 1.0), base0) + if expr.exp == S.Half: + fn = self.ext_fn.get("sqrt") + if not fn: + fn_type = ll.FunctionType(self.fp_type, [self.fp_type]) + fn = ll.Function(self.module, fn_type, "sqrt") + self.ext_fn["sqrt"] = fn + return self.builder.call(fn, [base0], "sqrt") + if expr.exp == 2: + return self.builder.fmul(base0, base0) + + exp0 = self._print(expr.exp) + fn = self.ext_fn.get("pow") + if not fn: + fn_type = ll.FunctionType(self.fp_type, [self.fp_type, self.fp_type]) + fn = ll.Function(self.module, fn_type, "pow") + self.ext_fn["pow"] = fn + return self.builder.call(fn, [base0, exp0], "pow") + + def _print_Mul(self, expr): + nodes = [self._print(a) for a in expr.args] + e = nodes[0] + for node in nodes[1:]: + e = self.builder.fmul(e, node) + return e + + def _print_Add(self, expr): + nodes = [self._print(a) for a in expr.args] + e = nodes[0] + for node in nodes[1:]: + e = self.builder.fadd(e, node) + return e + + # TODO - assumes all called functions take one double precision argument. + # Should have a list of math library functions to validate this. + def _print_Function(self, expr): + name = expr.func.__name__ + e0 = self._print(expr.args[0]) + fn = self.ext_fn.get(name) + if not fn: + fn_type = ll.FunctionType(self.fp_type, [self.fp_type]) + fn = ll.Function(self.module, fn_type, name) + self.ext_fn[name] = fn + return self.builder.call(fn, [e0], name) + + def emptyPrinter(self, expr): + raise TypeError("Unsupported type for LLVM JIT conversion: %s" + % type(expr)) + + +# Used when parameters are passed by array. Often used in callbacks to +# handle a variable number of parameters. +class LLVMJitCallbackPrinter(LLVMJitPrinter): + def __init__(self, *args, **kwargs): + super().__init__(*args, **kwargs) + + def _print_Indexed(self, expr): + array, idx = self.func_arg_map[expr.base] + offset = int(expr.indices[0].evalf()) + array_ptr = self.builder.gep(array, [ll.Constant(ll.IntType(32), offset)]) + fp_array_ptr = self.builder.bitcast(array_ptr, ll.PointerType(self.fp_type)) + value = self.builder.load(fp_array_ptr) + return value + + def _print_Symbol(self, s): + val = self.tmp_var.get(s) + if val: + return val + + array, idx = self.func_arg_map.get(s, [None, 0]) + if not array: + raise LookupError("Symbol not found: %s" % s) + array_ptr = self.builder.gep(array, [ll.Constant(ll.IntType(32), idx)]) + fp_array_ptr = self.builder.bitcast(array_ptr, + ll.PointerType(self.fp_type)) + value = self.builder.load(fp_array_ptr) + return value + + +# ensure lifetime of the execution engine persists (else call to compiled +# function will seg fault) +exe_engines = [] + +# ensure names for generated functions are unique +link_names = set() +current_link_suffix = 0 + + +class LLVMJitCode: + def __init__(self, signature): + self.signature = signature + self.fp_type = ll.DoubleType() + self.module = ll.Module('mod1') + self.fn = None + self.llvm_arg_types = [] + self.llvm_ret_type = self.fp_type + self.param_dict = {} # map symbol name to LLVM function argument + self.link_name = '' + + def _from_ctype(self, ctype): + if ctype == ctypes.c_int: + return ll.IntType(32) + if ctype == ctypes.c_double: + return self.fp_type + if ctype == ctypes.POINTER(ctypes.c_double): + return ll.PointerType(self.fp_type) + if ctype == ctypes.c_void_p: + return ll.PointerType(ll.IntType(32)) + if ctype == ctypes.py_object: + return ll.PointerType(ll.IntType(32)) + + print("Unhandled ctype = %s" % str(ctype)) + + def _create_args(self, func_args): + """Create types for function arguments""" + self.llvm_ret_type = self._from_ctype(self.signature.ret_type) + self.llvm_arg_types = \ + [self._from_ctype(a) for a in self.signature.arg_ctypes] + + def _create_function_base(self): + """Create function with name and type signature""" + global current_link_suffix + default_link_name = 'jit_func' + current_link_suffix += 1 + self.link_name = default_link_name + str(current_link_suffix) + link_names.add(self.link_name) + + fn_type = ll.FunctionType(self.llvm_ret_type, self.llvm_arg_types) + self.fn = ll.Function(self.module, fn_type, name=self.link_name) + + def _create_param_dict(self, func_args): + """Mapping of symbolic values to function arguments""" + for i, a in enumerate(func_args): + self.fn.args[i].name = str(a) + self.param_dict[a] = self.fn.args[i] + + def _create_function(self, expr): + """Create function body and return LLVM IR""" + bb_entry = self.fn.append_basic_block('entry') + builder = ll.IRBuilder(bb_entry) + + lj = LLVMJitPrinter(self.module, builder, self.fn, + func_arg_map=self.param_dict) + + ret = self._convert_expr(lj, expr) + lj.builder.ret(self._wrap_return(lj, ret)) + + strmod = str(self.module) + return strmod + + def _wrap_return(self, lj, vals): + # Return a single double if there is one return value, + # else return a tuple of doubles. + + # Don't wrap return value in this case + if self.signature.ret_type == ctypes.c_double: + return vals[0] + + # Use this instead of a real PyObject* + void_ptr = ll.PointerType(ll.IntType(32)) + + # Create a wrapped double: PyObject* PyFloat_FromDouble(double v) + wrap_type = ll.FunctionType(void_ptr, [self.fp_type]) + wrap_fn = ll.Function(lj.module, wrap_type, "PyFloat_FromDouble") + + wrapped_vals = [lj.builder.call(wrap_fn, [v]) for v in vals] + if len(vals) == 1: + final_val = wrapped_vals[0] + else: + # Create a tuple: PyObject* PyTuple_Pack(Py_ssize_t n, ...) + + # This should be Py_ssize_t + tuple_arg_types = [ll.IntType(32)] + + tuple_arg_types.extend([void_ptr]*len(vals)) + tuple_type = ll.FunctionType(void_ptr, tuple_arg_types) + tuple_fn = ll.Function(lj.module, tuple_type, "PyTuple_Pack") + + tuple_args = [ll.Constant(ll.IntType(32), len(wrapped_vals))] + tuple_args.extend(wrapped_vals) + + final_val = lj.builder.call(tuple_fn, tuple_args) + + return final_val + + def _convert_expr(self, lj, expr): + try: + # Match CSE return data structure. + if len(expr) == 2: + tmp_exprs = expr[0] + final_exprs = expr[1] + if len(final_exprs) != 1 and self.signature.ret_type == ctypes.c_double: + raise NotImplementedError("Return of multiple expressions not supported for this callback") + for name, e in tmp_exprs: + val = lj._print(e) + lj._add_tmp_var(name, val) + except TypeError: + final_exprs = [expr] + + vals = [lj._print(e) for e in final_exprs] + + return vals + + def _compile_function(self, strmod): + llmod = llvm.parse_assembly(strmod) + + pmb = llvm.create_pass_manager_builder() + pmb.opt_level = 2 + pass_manager = llvm.create_module_pass_manager() + pmb.populate(pass_manager) + + pass_manager.run(llmod) + + target_machine = \ + llvm.Target.from_default_triple().create_target_machine() + exe_eng = llvm.create_mcjit_compiler(llmod, target_machine) + exe_eng.finalize_object() + exe_engines.append(exe_eng) + + if False: + print("Assembly") + print(target_machine.emit_assembly(llmod)) + + fptr = exe_eng.get_function_address(self.link_name) + + return fptr + + +class LLVMJitCodeCallback(LLVMJitCode): + def __init__(self, signature): + super().__init__(signature) + + def _create_param_dict(self, func_args): + for i, a in enumerate(func_args): + if isinstance(a, IndexedBase): + self.param_dict[a] = (self.fn.args[i], i) + self.fn.args[i].name = str(a) + else: + self.param_dict[a] = (self.fn.args[self.signature.input_arg], + i) + + def _create_function(self, expr): + """Create function body and return LLVM IR""" + bb_entry = self.fn.append_basic_block('entry') + builder = ll.IRBuilder(bb_entry) + + lj = LLVMJitCallbackPrinter(self.module, builder, self.fn, + func_arg_map=self.param_dict) + + ret = self._convert_expr(lj, expr) + + if self.signature.ret_arg: + output_fp_ptr = builder.bitcast(self.fn.args[self.signature.ret_arg], + ll.PointerType(self.fp_type)) + for i, val in enumerate(ret): + index = ll.Constant(ll.IntType(32), i) + output_array_ptr = builder.gep(output_fp_ptr, [index]) + builder.store(val, output_array_ptr) + builder.ret(ll.Constant(ll.IntType(32), 0)) # return success + else: + lj.builder.ret(self._wrap_return(lj, ret)) + + strmod = str(self.module) + return strmod + + +class CodeSignature: + def __init__(self, ret_type): + self.ret_type = ret_type + self.arg_ctypes = [] + + # Input argument array element index + self.input_arg = 0 + + # For the case output value is referenced through a parameter rather + # than the return value + self.ret_arg = None + + +def _llvm_jit_code(args, expr, signature, callback_type): + """Create a native code function from a SymPy expression""" + if callback_type is None: + jit = LLVMJitCode(signature) + else: + jit = LLVMJitCodeCallback(signature) + + jit._create_args(args) + jit._create_function_base() + jit._create_param_dict(args) + strmod = jit._create_function(expr) + if False: + print("LLVM IR") + print(strmod) + fptr = jit._compile_function(strmod) + return fptr + + +@doctest_depends_on(modules=('llvmlite', 'scipy')) +def llvm_callable(args, expr, callback_type=None): + '''Compile function from a SymPy expression + + Expressions are evaluated using double precision arithmetic. + Some single argument math functions (exp, sin, cos, etc.) are supported + in expressions. + + Parameters + ========== + + args : List of Symbol + Arguments to the generated function. Usually the free symbols in + the expression. Currently each one is assumed to convert to + a double precision scalar. + expr : Expr, or (Replacements, Expr) as returned from 'cse' + Expression to compile. + callback_type : string + Create function with signature appropriate to use as a callback. + Currently supported: + 'scipy.integrate' + 'scipy.integrate.test' + 'cubature' + + Returns + ======= + + Compiled function that can evaluate the expression. + + Examples + ======== + + >>> import sympy.printing.llvmjitcode as jit + >>> from sympy.abc import a + >>> e = a*a + a + 1 + >>> e1 = jit.llvm_callable([a], e) + >>> e.subs(a, 1.1) # Evaluate via substitution + 3.31000000000000 + >>> e1(1.1) # Evaluate using JIT-compiled code + 3.3100000000000005 + + + Callbacks for integration functions can be JIT compiled. + + >>> import sympy.printing.llvmjitcode as jit + >>> from sympy.abc import a + >>> from sympy import integrate + >>> from scipy.integrate import quad + >>> e = a*a + >>> e1 = jit.llvm_callable([a], e, callback_type='scipy.integrate') + >>> integrate(e, (a, 0.0, 2.0)) + 2.66666666666667 + >>> quad(e1, 0.0, 2.0)[0] + 2.66666666666667 + + The 'cubature' callback is for the Python wrapper around the + cubature package ( https://github.com/saullocastro/cubature ) + and ( http://ab-initio.mit.edu/wiki/index.php/Cubature ) + + There are two signatures for the SciPy integration callbacks. + The first ('scipy.integrate') is the function to be passed to the + integration routine, and will pass the signature checks. + The second ('scipy.integrate.test') is only useful for directly calling + the function using ctypes variables. It will not pass the signature checks + for scipy.integrate. + + The return value from the cse module can also be compiled. This + can improve the performance of the compiled function. If multiple + expressions are given to cse, the compiled function returns a tuple. + The 'cubature' callback handles multiple expressions (set `fdim` + to match in the integration call.) + + >>> import sympy.printing.llvmjitcode as jit + >>> from sympy import cse + >>> from sympy.abc import x,y + >>> e1 = x*x + y*y + >>> e2 = 4*(x*x + y*y) + 8.0 + >>> after_cse = cse([e1,e2]) + >>> after_cse + ([(x0, x**2), (x1, y**2)], [x0 + x1, 4*x0 + 4*x1 + 8.0]) + >>> j1 = jit.llvm_callable([x,y], after_cse) + >>> j1(1.0, 2.0) + (5.0, 28.0) + ''' + + if not llvmlite: + raise ImportError("llvmlite is required for llvmjitcode") + + signature = CodeSignature(ctypes.py_object) + + arg_ctypes = [] + if callback_type is None: + for _ in args: + arg_ctype = ctypes.c_double + arg_ctypes.append(arg_ctype) + elif callback_type in ('scipy.integrate', 'scipy.integrate.test'): + signature.ret_type = ctypes.c_double + arg_ctypes = [ctypes.c_int, ctypes.POINTER(ctypes.c_double)] + arg_ctypes_formal = [ctypes.c_int, ctypes.c_double] + signature.input_arg = 1 + elif callback_type == 'cubature': + arg_ctypes = [ctypes.c_int, + ctypes.POINTER(ctypes.c_double), + ctypes.c_void_p, + ctypes.c_int, + ctypes.POINTER(ctypes.c_double) + ] + signature.ret_type = ctypes.c_int + signature.input_arg = 1 + signature.ret_arg = 4 + else: + raise ValueError("Unknown callback type: %s" % callback_type) + + signature.arg_ctypes = arg_ctypes + + fptr = _llvm_jit_code(args, expr, signature, callback_type) + + if callback_type and callback_type == 'scipy.integrate': + arg_ctypes = arg_ctypes_formal + + # PYFUNCTYPE holds the GIL which is needed to prevent a segfault when + # calling PyFloat_FromDouble on Python 3.10. Probably it is better to use + # ctypes.c_double when returning a float rather than using ctypes.py_object + # and returning a PyFloat from inside the jitted function (i.e. let ctypes + # handle the conversion from double to PyFloat). + if signature.ret_type == ctypes.py_object: + FUNCTYPE = ctypes.PYFUNCTYPE + else: + FUNCTYPE = ctypes.CFUNCTYPE + + cfunc = FUNCTYPE(signature.ret_type, *arg_ctypes)(fptr) + return cfunc diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/maple.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/maple.py new file mode 100644 index 0000000000000000000000000000000000000000..2c937cd262ab7f3ee5f32b3f4b5eb5633bc6bb3c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/maple.py @@ -0,0 +1,311 @@ +""" +Maple code printer + +The MapleCodePrinter converts single SymPy expressions into single +Maple expressions, using the functions defined in the Maple objects where possible. + + +FIXME: This module is still under actively developed. Some functions may be not completed. +""" + +from sympy.core import S +from sympy.core.numbers import Integer, IntegerConstant, equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE + +import sympy + +_known_func_same_name = ( + 'sin', 'cos', 'tan', 'sec', 'csc', 'cot', 'sinh', 'cosh', 'tanh', 'sech', + 'csch', 'coth', 'exp', 'floor', 'factorial', 'bernoulli', 'euler', + 'fibonacci', 'gcd', 'lcm', 'conjugate', 'Ci', 'Chi', 'Ei', 'Li', 'Si', 'Shi', + 'erf', 'erfc', 'harmonic', 'LambertW', + 'sqrt', # For automatic rewrites +) + +known_functions = { + # SymPy -> Maple + 'Abs': 'abs', + 'log': 'ln', + 'asin': 'arcsin', + 'acos': 'arccos', + 'atan': 'arctan', + 'asec': 'arcsec', + 'acsc': 'arccsc', + 'acot': 'arccot', + 'asinh': 'arcsinh', + 'acosh': 'arccosh', + 'atanh': 'arctanh', + 'asech': 'arcsech', + 'acsch': 'arccsch', + 'acoth': 'arccoth', + 'ceiling': 'ceil', + 'Max' : 'max', + 'Min' : 'min', + + 'factorial2': 'doublefactorial', + 'RisingFactorial': 'pochhammer', + 'besseli': 'BesselI', + 'besselj': 'BesselJ', + 'besselk': 'BesselK', + 'bessely': 'BesselY', + 'hankelh1': 'HankelH1', + 'hankelh2': 'HankelH2', + 'airyai': 'AiryAi', + 'airybi': 'AiryBi', + 'appellf1': 'AppellF1', + 'fresnelc': 'FresnelC', + 'fresnels': 'FresnelS', + 'lerchphi' : 'LerchPhi', +} + +for _func in _known_func_same_name: + known_functions[_func] = _func + +number_symbols = { + # SymPy -> Maple + S.Pi: 'Pi', + S.Exp1: 'exp(1)', + S.Catalan: 'Catalan', + S.EulerGamma: 'gamma', + S.GoldenRatio: '(1/2 + (1/2)*sqrt(5))' +} + +spec_relational_ops = { + # SymPy -> Maple + '==': '=', + '!=': '<>' +} + +not_supported_symbol = [ + S.ComplexInfinity +] + +class MapleCodePrinter(CodePrinter): + """ + Printer which converts a SymPy expression into a maple code. + """ + printmethod = "_maple" + language = "maple" + + _operators = { + 'and': 'and', + 'or': 'or', + 'not': 'not ', + } + + _default_settings = dict(CodePrinter._default_settings, **{ + 'inline': True, + 'allow_unknown_functions': True, + }) + + def __init__(self, settings=None): + if settings is None: + settings = {} + super().__init__(settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + + def _get_statement(self, codestring): + return "%s;" % codestring + + def _get_comment(self, text): + return "# {}".format(text) + + def _declare_number_const(self, name, value): + return "{} := {};".format(name, + value.evalf(self._settings['precision'])) + + def _format_code(self, lines): + return lines + + def _print_tuple(self, expr): + return self._print(list(expr)) + + def _print_Tuple(self, expr): + return self._print(list(expr)) + + def _print_Assignment(self, expr): + lhs = self._print(expr.lhs) + rhs = self._print(expr.rhs) + return "{lhs} := {rhs}".format(lhs=lhs, rhs=rhs) + + def _print_Pow(self, expr, **kwargs): + PREC = precedence(expr) + if equal_valued(expr.exp, -1): + return '1/%s' % (self.parenthesize(expr.base, PREC)) + elif equal_valued(expr.exp, 0.5): + return 'sqrt(%s)' % self._print(expr.base) + elif equal_valued(expr.exp, -0.5): + return '1/sqrt(%s)' % self._print(expr.base) + else: + return '{base}^{exp}'.format( + base=self.parenthesize(expr.base, PREC), + exp=self.parenthesize(expr.exp, PREC)) + + def _print_Piecewise(self, expr): + if (expr.args[-1].cond is not True) and (expr.args[-1].cond != S.BooleanTrue): + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + _coup_list = [ + ("{c}, {e}".format(c=self._print(c), + e=self._print(e)) if c is not True and c is not S.BooleanTrue else "{e}".format( + e=self._print(e))) + for e, c in expr.args] + _inbrace = ', '.join(_coup_list) + return 'piecewise({_inbrace})'.format(_inbrace=_inbrace) + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + return "{p}/{q}".format(p=str(p), q=str(q)) + + def _print_Relational(self, expr): + PREC=precedence(expr) + lhs_code = self.parenthesize(expr.lhs, PREC) + rhs_code = self.parenthesize(expr.rhs, PREC) + op = expr.rel_op + if op in spec_relational_ops: + op = spec_relational_ops[op] + return "{lhs} {rel_op} {rhs}".format(lhs=lhs_code, rel_op=op, rhs=rhs_code) + + def _print_NumberSymbol(self, expr): + return number_symbols[expr] + + def _print_NegativeInfinity(self, expr): + return '-infinity' + + def _print_Infinity(self, expr): + return 'infinity' + + def _print_BooleanTrue(self, expr): + return "true" + + def _print_BooleanFalse(self, expr): + return "false" + + def _print_bool(self, expr): + return 'true' if expr else 'false' + + def _print_NaN(self, expr): + return 'undefined' + + def _get_matrix(self, expr, sparse=False): + if S.Zero in expr.shape: + _strM = 'Matrix([], storage = {storage})'.format( + storage='sparse' if sparse else 'rectangular') + else: + _strM = 'Matrix({list}, storage = {storage})'.format( + list=self._print(expr.tolist()), + storage='sparse' if sparse else 'rectangular') + return _strM + + def _print_MatrixElement(self, expr): + return "{parent}[{i_maple}, {j_maple}]".format( + parent=self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True), + i_maple=self._print(expr.i + 1), + j_maple=self._print(expr.j + 1)) + + def _print_MatrixBase(self, expr): + return self._get_matrix(expr, sparse=False) + + def _print_SparseRepMatrix(self, expr): + return self._get_matrix(expr, sparse=True) + + def _print_Identity(self, expr): + if isinstance(expr.rows, (Integer, IntegerConstant)): + return self._print(sympy.SparseMatrix(expr)) + else: + return "Matrix({var_size}, shape = identity)".format(var_size=self._print(expr.rows)) + + def _print_MatMul(self, expr): + PREC=precedence(expr) + _fact_list = list(expr.args) + _const = None + if not isinstance(_fact_list[0], (sympy.MatrixBase, sympy.MatrixExpr, + sympy.MatrixSlice, sympy.MatrixSymbol)): + _const, _fact_list = _fact_list[0], _fact_list[1:] + + if _const is None or _const == 1: + return '.'.join(self.parenthesize(_m, PREC) for _m in _fact_list) + else: + return '{c}*{m}'.format(c=_const, m='.'.join(self.parenthesize(_m, PREC) for _m in _fact_list)) + + def _print_MatPow(self, expr): + # This function requires LinearAlgebra Function in Maple + return 'MatrixPower({A}, {n})'.format(A=self._print(expr.base), n=self._print(expr.exp)) + + def _print_HadamardProduct(self, expr): + PREC = precedence(expr) + _fact_list = list(expr.args) + return '*'.join(self.parenthesize(_m, PREC) for _m in _fact_list) + + def _print_Derivative(self, expr): + _f, (_var, _order) = expr.args + + if _order != 1: + _second_arg = '{var}${order}'.format(var=self._print(_var), + order=self._print(_order)) + else: + _second_arg = '{var}'.format(var=self._print(_var)) + return 'diff({func_expr}, {sec_arg})'.format(func_expr=self._print(_f), sec_arg=_second_arg) + + +def maple_code(expr, assign_to=None, **settings): + r"""Converts ``expr`` to a string of Maple code. + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for + expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=16]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, cfunction_string)]. See + below for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + inline: bool, optional + If True, we try to create single-statement code instead of multiple + statements. [default=True]. + + """ + return MapleCodePrinter(settings).doprint(expr, assign_to) + + +def print_maple_code(expr, **settings): + """Prints the Maple representation of the given expression. + + See :func:`maple_code` for the meaning of the optional arguments. + + Examples + ======== + + >>> from sympy import print_maple_code, symbols + >>> x, y = symbols('x y') + >>> print_maple_code(x, assign_to=y) + y := x + """ + print(maple_code(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathematica.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathematica.py new file mode 100644 index 0000000000000000000000000000000000000000..064925ec1a9a477d7509110c57311239bac9fcaf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathematica.py @@ -0,0 +1,353 @@ +""" +Mathematica code printer +""" + +from __future__ import annotations +from typing import Any + +from sympy.core import Basic, Expr, Float +from sympy.core.sorting import default_sort_key + +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence + +# Used in MCodePrinter._print_Function(self) +known_functions = { + "exp": [(lambda x: True, "Exp")], + "log": [(lambda x: True, "Log")], + "sin": [(lambda x: True, "Sin")], + "cos": [(lambda x: True, "Cos")], + "tan": [(lambda x: True, "Tan")], + "cot": [(lambda x: True, "Cot")], + "sec": [(lambda x: True, "Sec")], + "csc": [(lambda x: True, "Csc")], + "asin": [(lambda x: True, "ArcSin")], + "acos": [(lambda x: True, "ArcCos")], + "atan": [(lambda x: True, "ArcTan")], + "acot": [(lambda x: True, "ArcCot")], + "asec": [(lambda x: True, "ArcSec")], + "acsc": [(lambda x: True, "ArcCsc")], + "sinh": [(lambda x: True, "Sinh")], + "cosh": [(lambda x: True, "Cosh")], + "tanh": [(lambda x: True, "Tanh")], + "coth": [(lambda x: True, "Coth")], + "sech": [(lambda x: True, "Sech")], + "csch": [(lambda x: True, "Csch")], + "asinh": [(lambda x: True, "ArcSinh")], + "acosh": [(lambda x: True, "ArcCosh")], + "atanh": [(lambda x: True, "ArcTanh")], + "acoth": [(lambda x: True, "ArcCoth")], + "asech": [(lambda x: True, "ArcSech")], + "acsch": [(lambda x: True, "ArcCsch")], + "sinc": [(lambda x: True, "Sinc")], + "conjugate": [(lambda x: True, "Conjugate")], + "Max": [(lambda *x: True, "Max")], + "Min": [(lambda *x: True, "Min")], + "erf": [(lambda x: True, "Erf")], + "erf2": [(lambda *x: True, "Erf")], + "erfc": [(lambda x: True, "Erfc")], + "erfi": [(lambda x: True, "Erfi")], + "erfinv": [(lambda x: True, "InverseErf")], + "erfcinv": [(lambda x: True, "InverseErfc")], + "erf2inv": [(lambda *x: True, "InverseErf")], + "expint": [(lambda *x: True, "ExpIntegralE")], + "Ei": [(lambda x: True, "ExpIntegralEi")], + "fresnelc": [(lambda x: True, "FresnelC")], + "fresnels": [(lambda x: True, "FresnelS")], + "gamma": [(lambda x: True, "Gamma")], + "uppergamma": [(lambda *x: True, "Gamma")], + "polygamma": [(lambda *x: True, "PolyGamma")], + "loggamma": [(lambda x: True, "LogGamma")], + "beta": [(lambda *x: True, "Beta")], + "Ci": [(lambda x: True, "CosIntegral")], + "Si": [(lambda x: True, "SinIntegral")], + "Chi": [(lambda x: True, "CoshIntegral")], + "Shi": [(lambda x: True, "SinhIntegral")], + "li": [(lambda x: True, "LogIntegral")], + "factorial": [(lambda x: True, "Factorial")], + "factorial2": [(lambda x: True, "Factorial2")], + "subfactorial": [(lambda x: True, "Subfactorial")], + "catalan": [(lambda x: True, "CatalanNumber")], + "harmonic": [(lambda *x: True, "HarmonicNumber")], + "lucas": [(lambda x: True, "LucasL")], + "RisingFactorial": [(lambda *x: True, "Pochhammer")], + "FallingFactorial": [(lambda *x: True, "FactorialPower")], + "laguerre": [(lambda *x: True, "LaguerreL")], + "assoc_laguerre": [(lambda *x: True, "LaguerreL")], + "hermite": [(lambda *x: True, "HermiteH")], + "jacobi": [(lambda *x: True, "JacobiP")], + "gegenbauer": [(lambda *x: True, "GegenbauerC")], + "chebyshevt": [(lambda *x: True, "ChebyshevT")], + "chebyshevu": [(lambda *x: True, "ChebyshevU")], + "legendre": [(lambda *x: True, "LegendreP")], + "assoc_legendre": [(lambda *x: True, "LegendreP")], + "mathieuc": [(lambda *x: True, "MathieuC")], + "mathieus": [(lambda *x: True, "MathieuS")], + "mathieucprime": [(lambda *x: True, "MathieuCPrime")], + "mathieusprime": [(lambda *x: True, "MathieuSPrime")], + "stieltjes": [(lambda x: True, "StieltjesGamma")], + "elliptic_e": [(lambda *x: True, "EllipticE")], + "elliptic_f": [(lambda *x: True, "EllipticE")], + "elliptic_k": [(lambda x: True, "EllipticK")], + "elliptic_pi": [(lambda *x: True, "EllipticPi")], + "zeta": [(lambda *x: True, "Zeta")], + "dirichlet_eta": [(lambda x: True, "DirichletEta")], + "riemann_xi": [(lambda x: True, "RiemannXi")], + "besseli": [(lambda *x: True, "BesselI")], + "besselj": [(lambda *x: True, "BesselJ")], + "besselk": [(lambda *x: True, "BesselK")], + "bessely": [(lambda *x: True, "BesselY")], + "hankel1": [(lambda *x: True, "HankelH1")], + "hankel2": [(lambda *x: True, "HankelH2")], + "airyai": [(lambda x: True, "AiryAi")], + "airybi": [(lambda x: True, "AiryBi")], + "airyaiprime": [(lambda x: True, "AiryAiPrime")], + "airybiprime": [(lambda x: True, "AiryBiPrime")], + "polylog": [(lambda *x: True, "PolyLog")], + "lerchphi": [(lambda *x: True, "LerchPhi")], + "gcd": [(lambda *x: True, "GCD")], + "lcm": [(lambda *x: True, "LCM")], + "jn": [(lambda *x: True, "SphericalBesselJ")], + "yn": [(lambda *x: True, "SphericalBesselY")], + "hyper": [(lambda *x: True, "HypergeometricPFQ")], + "meijerg": [(lambda *x: True, "MeijerG")], + "appellf1": [(lambda *x: True, "AppellF1")], + "DiracDelta": [(lambda x: True, "DiracDelta")], + "Heaviside": [(lambda x: True, "HeavisideTheta")], + "KroneckerDelta": [(lambda *x: True, "KroneckerDelta")], + "sqrt": [(lambda x: True, "Sqrt")], # For automatic rewrites +} + + +class MCodePrinter(CodePrinter): + """A printer to convert Python expressions to + strings of the Wolfram's Mathematica code + """ + printmethod = "_mcode" + language = "Wolfram Language" + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 15, + 'user_functions': {}, + }) + + _number_symbols: set[tuple[Expr, Float]] = set() + _not_supported: set[Basic] = set() + + def __init__(self, settings={}): + """Register function mappings supplied by user""" + CodePrinter.__init__(self, settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}).copy() + for k, v in userfuncs.items(): + if not isinstance(v, list): + userfuncs[k] = [(lambda *x: True, v)] + self.known_functions.update(userfuncs) + + def _format_code(self, lines): + return lines + + def _print_Pow(self, expr): + PREC = precedence(expr) + return '%s^%s' % (self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC)) + + def _print_Mul(self, expr): + PREC = precedence(expr) + c, nc = expr.args_cnc() + res = super()._print_Mul(expr.func(*c)) + if nc: + res += '*' + res += '**'.join(self.parenthesize(a, PREC) for a in nc) + return res + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + # Primitive numbers + def _print_Zero(self, expr): + return '0' + + def _print_One(self, expr): + return '1' + + def _print_NegativeOne(self, expr): + return '-1' + + def _print_Half(self, expr): + return '1/2' + + def _print_ImaginaryUnit(self, expr): + return 'I' + + + # Infinity and invalid numbers + def _print_Infinity(self, expr): + return 'Infinity' + + def _print_NegativeInfinity(self, expr): + return '-Infinity' + + def _print_ComplexInfinity(self, expr): + return 'ComplexInfinity' + + def _print_NaN(self, expr): + return 'Indeterminate' + + + # Mathematical constants + def _print_Exp1(self, expr): + return 'E' + + def _print_Pi(self, expr): + return 'Pi' + + def _print_GoldenRatio(self, expr): + return 'GoldenRatio' + + def _print_TribonacciConstant(self, expr): + expanded = expr.expand(func=True) + PREC = precedence(expr) + return self.parenthesize(expanded, PREC) + + def _print_EulerGamma(self, expr): + return 'EulerGamma' + + def _print_Catalan(self, expr): + return 'Catalan' + + + def _print_list(self, expr): + return '{' + ', '.join(self.doprint(a) for a in expr) + '}' + _print_tuple = _print_list + _print_Tuple = _print_list + + def _print_ImmutableDenseMatrix(self, expr): + return self.doprint(expr.tolist()) + + def _print_ImmutableSparseMatrix(self, expr): + + def print_rule(pos, val): + return '{} -> {}'.format( + self.doprint((pos[0]+1, pos[1]+1)), self.doprint(val)) + + def print_data(): + items = sorted(expr.todok().items(), key=default_sort_key) + return '{' + \ + ', '.join(print_rule(k, v) for k, v in items) + \ + '}' + + def print_dims(): + return self.doprint(expr.shape) + + return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) + + def _print_ImmutableDenseNDimArray(self, expr): + return self.doprint(expr.tolist()) + + def _print_ImmutableSparseNDimArray(self, expr): + def print_string_list(string_list): + return '{' + ', '.join(a for a in string_list) + '}' + + def to_mathematica_index(*args): + """Helper function to change Python style indexing to + Pathematica indexing. + + Python indexing (0, 1 ... n-1) + -> Mathematica indexing (1, 2 ... n) + """ + return tuple(i + 1 for i in args) + + def print_rule(pos, val): + """Helper function to print a rule of Mathematica""" + return '{} -> {}'.format(self.doprint(pos), self.doprint(val)) + + def print_data(): + """Helper function to print data part of Mathematica + sparse array. + + It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` + from + https://reference.wolfram.com/language/ref/SparseArray.html + + ``data`` must be formatted with rule. + """ + return print_string_list( + [print_rule( + to_mathematica_index(*(expr._get_tuple_index(key))), + value) + for key, value in sorted(expr._sparse_array.items())] + ) + + def print_dims(): + """Helper function to print dimensions part of Mathematica + sparse array. + + It uses the fourth notation ``SparseArray[data,{d1,d2,...}]`` + from + https://reference.wolfram.com/language/ref/SparseArray.html + """ + return self.doprint(expr.shape) + + return 'SparseArray[{}, {}]'.format(print_data(), print_dims()) + + def _print_Function(self, expr): + if expr.func.__name__ in self.known_functions: + cond_mfunc = self.known_functions[expr.func.__name__] + for cond, mfunc in cond_mfunc: + if cond(*expr.args): + return "%s[%s]" % (mfunc, self.stringify(expr.args, ", ")) + elif expr.func.__name__ in self._rewriteable_functions: + # Simple rewrite to supported function possible + target_f, required_fs = self._rewriteable_functions[expr.func.__name__] + if self._can_print(target_f) and all(self._can_print(f) for f in required_fs): + return self._print(expr.rewrite(target_f)) + return expr.func.__name__ + "[%s]" % self.stringify(expr.args, ", ") + + _print_MinMaxBase = _print_Function + + def _print_LambertW(self, expr): + if len(expr.args) == 1: + return "ProductLog[{}]".format(self._print(expr.args[0])) + return "ProductLog[{}, {}]".format( + self._print(expr.args[1]), self._print(expr.args[0])) + + def _print_atan2(self, expr): + return "ArcTan[{}, {}]".format( + self._print(expr.args[1]), self._print(expr.args[0])) + + def _print_Integral(self, expr): + if len(expr.variables) == 1 and not expr.limits[0][1:]: + args = [expr.args[0], expr.variables[0]] + else: + args = expr.args + return "Hold[Integrate[" + ', '.join(self.doprint(a) for a in args) + "]]" + + def _print_Sum(self, expr): + return "Hold[Sum[" + ', '.join(self.doprint(a) for a in expr.args) + "]]" + + def _print_Derivative(self, expr): + dexpr = expr.expr + dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count] + return "Hold[D[" + ', '.join(self.doprint(a) for a in [dexpr] + dvars) + "]]" + + + def _get_comment(self, text): + return "(* {} *)".format(text) + + +def mathematica_code(expr, **settings): + r"""Converts an expr to a string of the Wolfram Mathematica code + + Examples + ======== + + >>> from sympy import mathematica_code as mcode, symbols, sin + >>> x = symbols('x') + >>> mcode(sin(x).series(x).removeO()) + '(1/120)*x^5 - 1/6*x^3 + x' + """ + return MCodePrinter(settings).doprint(expr) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathml.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathml.py new file mode 100644 index 0000000000000000000000000000000000000000..4dff74cd64b17036d3ff2a766253c9af850f088d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/mathml.py @@ -0,0 +1,2157 @@ +""" +A MathML printer. +""" + +from __future__ import annotations +from typing import Any + +from sympy.core.mul import Mul +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.sympify import sympify +from sympy.printing.conventions import split_super_sub, requires_partial +from sympy.printing.precedence import \ + precedence_traditional, PRECEDENCE, PRECEDENCE_TRADITIONAL +from sympy.printing.pretty.pretty_symbology import greek_unicode +from sympy.printing.printer import Printer, print_function + +from mpmath.libmp import prec_to_dps, repr_dps, to_str as mlib_to_str + + +class MathMLPrinterBase(Printer): + """Contains common code required for MathMLContentPrinter and + MathMLPresentationPrinter. + """ + + _default_settings: dict[str, Any] = { + "order": None, + "encoding": "utf-8", + "fold_frac_powers": False, + "fold_func_brackets": False, + "fold_short_frac": None, + "inv_trig_style": "abbreviated", + "ln_notation": False, + "long_frac_ratio": None, + "mat_delim": "[", + "mat_symbol_style": "plain", + "mul_symbol": None, + "root_notation": True, + "symbol_names": {}, + "mul_symbol_mathml_numbers": '·', + "disable_split_super_sub": False, + } + + def __init__(self, settings=None): + Printer.__init__(self, settings) + from xml.dom.minidom import Document, Text + + self.dom = Document() + + # Workaround to allow strings to remain unescaped + # Based on + # https://stackoverflow.com/questions/38015864/python-xml-dom-minidom-\ + # please-dont-escape-my-strings/38041194 + class RawText(Text): + def writexml(self, writer, indent='', addindent='', newl=''): + if self.data: + writer.write('{}{}{}'.format(indent, self.data, newl)) + + def createRawTextNode(data): + r = RawText() + r.data = data + r.ownerDocument = self.dom + return r + + self.dom.createTextNode = createRawTextNode + + def doprint(self, expr): + """ + Prints the expression as MathML. + """ + mathML = Printer._print(self, expr) + unistr = mathML.toxml() + xmlbstr = unistr.encode('ascii', 'xmlcharrefreplace') + res = xmlbstr.decode() + return res + + def _split_super_sub(self, name): + if self._settings["disable_split_super_sub"]: + return (name, [], []) + else: + return split_super_sub(name) + + +class MathMLContentPrinter(MathMLPrinterBase): + """Prints an expression to the Content MathML markup language. + + References: https://www.w3.org/TR/MathML2/chapter4.html + """ + printmethod = "_mathml_content" + + def mathml_tag(self, e): + """Returns the MathML tag for an expression.""" + translate = { + 'Add': 'plus', + 'Mul': 'times', + 'Derivative': 'diff', + 'Number': 'cn', + 'int': 'cn', + 'Pow': 'power', + 'Max': 'max', + 'Min': 'min', + 'Abs': 'abs', + 'And': 'and', + 'Or': 'or', + 'Xor': 'xor', + 'Not': 'not', + 'Implies': 'implies', + 'Symbol': 'ci', + 'MatrixSymbol': 'ci', + 'RandomSymbol': 'ci', + 'Integral': 'int', + 'Sum': 'sum', + 'sin': 'sin', + 'cos': 'cos', + 'tan': 'tan', + 'cot': 'cot', + 'csc': 'csc', + 'sec': 'sec', + 'sinh': 'sinh', + 'cosh': 'cosh', + 'tanh': 'tanh', + 'coth': 'coth', + 'csch': 'csch', + 'sech': 'sech', + 'asin': 'arcsin', + 'asinh': 'arcsinh', + 'acos': 'arccos', + 'acosh': 'arccosh', + 'atan': 'arctan', + 'atanh': 'arctanh', + 'atan2': 'arctan', + 'acot': 'arccot', + 'acoth': 'arccoth', + 'asec': 'arcsec', + 'asech': 'arcsech', + 'acsc': 'arccsc', + 'acsch': 'arccsch', + 'log': 'ln', + 'Equality': 'eq', + 'Unequality': 'neq', + 'GreaterThan': 'geq', + 'LessThan': 'leq', + 'StrictGreaterThan': 'gt', + 'StrictLessThan': 'lt', + 'Union': 'union', + 'Intersection': 'intersect', + } + + for cls in e.__class__.__mro__: + n = cls.__name__ + if n in translate: + return translate[n] + # Not found in the MRO set + n = e.__class__.__name__ + return n.lower() + + def _print_Mul(self, expr): + + if expr.could_extract_minus_sign(): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('minus')) + x.appendChild(self._print_Mul(-expr)) + return x + + from sympy.simplify import fraction + numer, denom = fraction(expr) + + if denom is not S.One: + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('divide')) + x.appendChild(self._print(numer)) + x.appendChild(self._print(denom)) + return x + + coeff, terms = expr.as_coeff_mul() + if coeff is S.One and len(terms) == 1: + # XXX since the negative coefficient has been handled, I don't + # think a coeff of 1 can remain + return self._print(terms[0]) + + if self.order != 'old': + terms = Mul._from_args(terms).as_ordered_factors() + + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('times')) + if coeff != 1: + x.appendChild(self._print(coeff)) + for term in terms: + x.appendChild(self._print(term)) + return x + + def _print_Add(self, expr, order=None): + args = self._as_ordered_terms(expr, order=order) + lastProcessed = self._print(args[0]) + plusNodes = [] + for arg in args[1:]: + if arg.could_extract_minus_sign(): + # use minus + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('minus')) + x.appendChild(lastProcessed) + x.appendChild(self._print(-arg)) + # invert expression since this is now minused + lastProcessed = x + if arg == args[-1]: + plusNodes.append(lastProcessed) + else: + plusNodes.append(lastProcessed) + lastProcessed = self._print(arg) + if arg == args[-1]: + plusNodes.append(self._print(arg)) + if len(plusNodes) == 1: + return lastProcessed + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('plus')) + while plusNodes: + x.appendChild(plusNodes.pop(0)) + return x + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + root = self.dom.createElement('piecewise') + for i, (e, c) in enumerate(expr.args): + if i == len(expr.args) - 1 and c == True: + piece = self.dom.createElement('otherwise') + piece.appendChild(self._print(e)) + else: + piece = self.dom.createElement('piece') + piece.appendChild(self._print(e)) + piece.appendChild(self._print(c)) + root.appendChild(piece) + return root + + def _print_MatrixBase(self, m): + x = self.dom.createElement('matrix') + for i in range(m.rows): + x_r = self.dom.createElement('matrixrow') + for j in range(m.cols): + x_r.appendChild(self._print(m[i, j])) + x.appendChild(x_r) + return x + + def _print_Rational(self, e): + if e.q == 1: + # don't divide + x = self.dom.createElement('cn') + x.appendChild(self.dom.createTextNode(str(e.p))) + return x + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('divide')) + # numerator + xnum = self.dom.createElement('cn') + xnum.appendChild(self.dom.createTextNode(str(e.p))) + # denominator + xdenom = self.dom.createElement('cn') + xdenom.appendChild(self.dom.createTextNode(str(e.q))) + x.appendChild(xnum) + x.appendChild(xdenom) + return x + + def _print_Limit(self, e): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement(self.mathml_tag(e))) + + x_1 = self.dom.createElement('bvar') + x_2 = self.dom.createElement('lowlimit') + x_1.appendChild(self._print(e.args[1])) + x_2.appendChild(self._print(e.args[2])) + + x.appendChild(x_1) + x.appendChild(x_2) + x.appendChild(self._print(e.args[0])) + return x + + def _print_ImaginaryUnit(self, e): + return self.dom.createElement('imaginaryi') + + def _print_EulerGamma(self, e): + return self.dom.createElement('eulergamma') + + def _print_GoldenRatio(self, e): + """We use unicode #x3c6 for Greek letter phi as defined here + https://www.w3.org/2003/entities/2007doc/isogrk1.html""" + x = self.dom.createElement('cn') + x.appendChild(self.dom.createTextNode("\N{GREEK SMALL LETTER PHI}")) + return x + + def _print_Exp1(self, e): + return self.dom.createElement('exponentiale') + + def _print_Pi(self, e): + return self.dom.createElement('pi') + + def _print_Infinity(self, e): + return self.dom.createElement('infinity') + + def _print_NaN(self, e): + return self.dom.createElement('notanumber') + + def _print_EmptySet(self, e): + return self.dom.createElement('emptyset') + + def _print_BooleanTrue(self, e): + return self.dom.createElement('true') + + def _print_BooleanFalse(self, e): + return self.dom.createElement('false') + + def _print_NegativeInfinity(self, e): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('minus')) + x.appendChild(self.dom.createElement('infinity')) + return x + + def _print_Integral(self, e): + def lime_recur(limits): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement(self.mathml_tag(e))) + bvar_elem = self.dom.createElement('bvar') + bvar_elem.appendChild(self._print(limits[0][0])) + x.appendChild(bvar_elem) + + if len(limits[0]) == 3: + low_elem = self.dom.createElement('lowlimit') + low_elem.appendChild(self._print(limits[0][1])) + x.appendChild(low_elem) + up_elem = self.dom.createElement('uplimit') + up_elem.appendChild(self._print(limits[0][2])) + x.appendChild(up_elem) + if len(limits[0]) == 2: + up_elem = self.dom.createElement('uplimit') + up_elem.appendChild(self._print(limits[0][1])) + x.appendChild(up_elem) + if len(limits) == 1: + x.appendChild(self._print(e.function)) + else: + x.appendChild(lime_recur(limits[1:])) + return x + + limits = list(e.limits) + limits.reverse() + return lime_recur(limits) + + def _print_Sum(self, e): + # Printer can be shared because Sum and Integral have the + # same internal representation. + return self._print_Integral(e) + + def _print_Symbol(self, sym): + ci = self.dom.createElement(self.mathml_tag(sym)) + + def join(items): + if len(items) > 1: + mrow = self.dom.createElement('mml:mrow') + for i, item in enumerate(items): + if i > 0: + mo = self.dom.createElement('mml:mo') + mo.appendChild(self.dom.createTextNode(" ")) + mrow.appendChild(mo) + mi = self.dom.createElement('mml:mi') + mi.appendChild(self.dom.createTextNode(item)) + mrow.appendChild(mi) + return mrow + else: + mi = self.dom.createElement('mml:mi') + mi.appendChild(self.dom.createTextNode(items[0])) + return mi + + # translate name, supers and subs to unicode characters + def translate(s): + if s in greek_unicode: + return greek_unicode.get(s) + else: + return s + + name, supers, subs = self._split_super_sub(sym.name) + name = translate(name) + supers = [translate(sup) for sup in supers] + subs = [translate(sub) for sub in subs] + + mname = self.dom.createElement('mml:mi') + mname.appendChild(self.dom.createTextNode(name)) + if not supers: + if not subs: + ci.appendChild(self.dom.createTextNode(name)) + else: + msub = self.dom.createElement('mml:msub') + msub.appendChild(mname) + msub.appendChild(join(subs)) + ci.appendChild(msub) + else: + if not subs: + msup = self.dom.createElement('mml:msup') + msup.appendChild(mname) + msup.appendChild(join(supers)) + ci.appendChild(msup) + else: + msubsup = self.dom.createElement('mml:msubsup') + msubsup.appendChild(mname) + msubsup.appendChild(join(subs)) + msubsup.appendChild(join(supers)) + ci.appendChild(msubsup) + return ci + + _print_MatrixSymbol = _print_Symbol + _print_RandomSymbol = _print_Symbol + + def _print_Pow(self, e): + # Here we use root instead of power if the exponent is the reciprocal + # of an integer + if (self._settings['root_notation'] and e.exp.is_Rational + and e.exp.p == 1): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('root')) + if e.exp.q != 2: + xmldeg = self.dom.createElement('degree') + xmlcn = self.dom.createElement('cn') + xmlcn.appendChild(self.dom.createTextNode(str(e.exp.q))) + xmldeg.appendChild(xmlcn) + x.appendChild(xmldeg) + x.appendChild(self._print(e.base)) + return x + + x = self.dom.createElement('apply') + x_1 = self.dom.createElement(self.mathml_tag(e)) + x.appendChild(x_1) + x.appendChild(self._print(e.base)) + x.appendChild(self._print(e.exp)) + return x + + def _print_Number(self, e): + x = self.dom.createElement(self.mathml_tag(e)) + x.appendChild(self.dom.createTextNode(str(e))) + return x + + def _print_Float(self, e): + x = self.dom.createElement(self.mathml_tag(e)) + repr_e = mlib_to_str(e._mpf_, repr_dps(e._prec)) + x.appendChild(self.dom.createTextNode(repr_e)) + return x + + def _print_Derivative(self, e): + x = self.dom.createElement('apply') + diff_symbol = self.mathml_tag(e) + if requires_partial(e.expr): + diff_symbol = 'partialdiff' + x.appendChild(self.dom.createElement(diff_symbol)) + x_1 = self.dom.createElement('bvar') + + for sym, times in reversed(e.variable_count): + x_1.appendChild(self._print(sym)) + if times > 1: + degree = self.dom.createElement('degree') + degree.appendChild(self._print(sympify(times))) + x_1.appendChild(degree) + + x.appendChild(x_1) + x.appendChild(self._print(e.expr)) + return x + + def _print_Function(self, e): + x = self.dom.createElement("apply") + x.appendChild(self.dom.createElement(self.mathml_tag(e))) + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_Basic(self, e): + x = self.dom.createElement(self.mathml_tag(e)) + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_AssocOp(self, e): + x = self.dom.createElement('apply') + x_1 = self.dom.createElement(self.mathml_tag(e)) + x.appendChild(x_1) + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_Relational(self, e): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement(self.mathml_tag(e))) + x.appendChild(self._print(e.lhs)) + x.appendChild(self._print(e.rhs)) + return x + + def _print_list(self, seq): + """MathML reference for the element: + https://www.w3.org/TR/MathML2/chapter4.html#contm.list""" + dom_element = self.dom.createElement('list') + for item in seq: + dom_element.appendChild(self._print(item)) + return dom_element + + def _print_int(self, p): + dom_element = self.dom.createElement(self.mathml_tag(p)) + dom_element.appendChild(self.dom.createTextNode(str(p))) + return dom_element + + _print_Implies = _print_AssocOp + _print_Not = _print_AssocOp + _print_Xor = _print_AssocOp + + def _print_FiniteSet(self, e): + x = self.dom.createElement('set') + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_Complement(self, e): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('setdiff')) + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_ProductSet(self, e): + x = self.dom.createElement('apply') + x.appendChild(self.dom.createElement('cartesianproduct')) + for arg in e.args: + x.appendChild(self._print(arg)) + return x + + def _print_Lambda(self, e): + # MathML reference for the lambda element: + # https://www.w3.org/TR/MathML2/chapter4.html#id.4.2.1.7 + x = self.dom.createElement(self.mathml_tag(e)) + for arg in e.signature: + x_1 = self.dom.createElement('bvar') + x_1.appendChild(self._print(arg)) + x.appendChild(x_1) + x.appendChild(self._print(e.expr)) + return x + + # XXX Symmetric difference is not supported for MathML content printers. + + +class MathMLPresentationPrinter(MathMLPrinterBase): + """Prints an expression to the Presentation MathML markup language. + + References: https://www.w3.org/TR/MathML2/chapter3.html + """ + printmethod = "_mathml_presentation" + + def mathml_tag(self, e): + """Returns the MathML tag for an expression.""" + translate = { + 'Number': 'mn', + 'Limit': '→', + 'Derivative': 'ⅆ', + 'int': 'mn', + 'Symbol': 'mi', + 'Integral': '∫', + 'Sum': '∑', + 'sin': 'sin', + 'cos': 'cos', + 'tan': 'tan', + 'cot': 'cot', + 'asin': 'arcsin', + 'asinh': 'arcsinh', + 'acos': 'arccos', + 'acosh': 'arccosh', + 'atan': 'arctan', + 'atanh': 'arctanh', + 'acot': 'arccot', + 'atan2': 'arctan', + 'Equality': '=', + 'Unequality': '≠', + 'GreaterThan': '≥', + 'LessThan': '≤', + 'StrictGreaterThan': '>', + 'StrictLessThan': '<', + 'lerchphi': 'Φ', + 'zeta': 'ζ', + 'dirichlet_eta': 'η', + 'elliptic_k': 'Κ', + 'lowergamma': 'γ', + 'uppergamma': 'Γ', + 'gamma': 'Γ', + 'totient': 'ϕ', + 'reduced_totient': 'λ', + 'primenu': 'ν', + 'primeomega': 'Ω', + 'fresnels': 'S', + 'fresnelc': 'C', + 'LambertW': 'W', + 'Heaviside': 'Θ', + 'BooleanTrue': 'True', + 'BooleanFalse': 'False', + 'NoneType': 'None', + 'mathieus': 'S', + 'mathieuc': 'C', + 'mathieusprime': 'S′', + 'mathieucprime': 'C′', + 'Lambda': 'lambda', + } + + def mul_symbol_selection(): + if (self._settings["mul_symbol"] is None or + self._settings["mul_symbol"] == 'None'): + return '⁢' + elif self._settings["mul_symbol"] == 'times': + return '×' + elif self._settings["mul_symbol"] == 'dot': + return '·' + elif self._settings["mul_symbol"] == 'ldot': + return '․' + elif not isinstance(self._settings["mul_symbol"], str): + raise TypeError + else: + return self._settings["mul_symbol"] + for cls in e.__class__.__mro__: + n = cls.__name__ + if n in translate: + return translate[n] + # Not found in the MRO set + if e.__class__.__name__ == "Mul": + return mul_symbol_selection() + n = e.__class__.__name__ + return n.lower() + + def _l_paren(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('(')) + return mo + + def _r_paren(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(')')) + return mo + + def _l_brace(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('{')) + return mo + + def _r_brace(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('}')) + return mo + + def _comma(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(',')) + return mo + + def _bar(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('|')) + return mo + + def _semicolon(self): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(';')) + return mo + + def _paren_comma_separated(self, *args): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._l_paren()) + for i, arg in enumerate(args): + if i: + mrow.appendChild(self._comma()) + mrow.appendChild(self._print(arg)) + mrow.appendChild(self._r_paren()) + return mrow + + def _paren_bar_separated(self, *args): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._l_paren()) + for i, arg in enumerate(args): + if i: + mrow.appendChild(self._bar()) + mrow.appendChild(self._print(arg)) + mrow.appendChild(self._r_paren()) + return mrow + + def parenthesize(self, item, level, strict=False): + prec_val = precedence_traditional(item) + if (prec_val < level) or ((not strict) and prec_val <= level): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._l_paren()) + mrow.appendChild(self._print(item)) + mrow.appendChild(self._r_paren()) + return mrow + return self._print(item) + + def _print_Mul(self, expr): + + def multiply(expr, mrow): + from sympy.simplify import fraction + numer, denom = fraction(expr) + if denom is not S.One: + frac = self.dom.createElement('mfrac') + if self._settings["fold_short_frac"] and len(str(expr)) < 7: + frac.setAttribute('bevelled', 'true') + xnum = self._print(numer) + xden = self._print(denom) + frac.appendChild(xnum) + frac.appendChild(xden) + mrow.appendChild(frac) + return mrow + + coeff, terms = expr.as_coeff_mul() + if coeff is S.One and len(terms) == 1: + mrow.appendChild(self._print(terms[0])) + return mrow + if self.order != 'old': + terms = Mul._from_args(terms).as_ordered_factors() + + if coeff != 1: + x = self._print(coeff) + y = self.dom.createElement('mo') + y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) + mrow.appendChild(x) + mrow.appendChild(y) + for term in terms: + mrow.appendChild(self.parenthesize(term, PRECEDENCE['Mul'])) + if not term == terms[-1]: + y = self.dom.createElement('mo') + y.appendChild(self.dom.createTextNode(self.mathml_tag(expr))) + mrow.appendChild(y) + return mrow + mrow = self.dom.createElement('mrow') + if expr.could_extract_minus_sign(): + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode('-')) + mrow.appendChild(x) + mrow = multiply(-expr, mrow) + else: + mrow = multiply(expr, mrow) + + return mrow + + def _print_Add(self, expr, order=None): + mrow = self.dom.createElement('mrow') + args = self._as_ordered_terms(expr, order=order) + mrow.appendChild(self._print(args[0])) + for arg in args[1:]: + if arg.could_extract_minus_sign(): + # use minus + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode('-')) + y = self._print(-arg) + # invert expression since this is now minused + else: + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode('+')) + y = self._print(arg) + mrow.appendChild(x) + mrow.appendChild(y) + + return mrow + + def _print_MatrixBase(self, m): + table = self.dom.createElement('mtable') + for i in range(m.rows): + x = self.dom.createElement('mtr') + for j in range(m.cols): + y = self.dom.createElement('mtd') + y.appendChild(self._print(m[i, j])) + x.appendChild(y) + table.appendChild(x) + mat_delim = self._settings["mat_delim"] + if mat_delim == '': + return table + left = self.dom.createElement('mo') + right = self.dom.createElement('mo') + if mat_delim == "[": + left.appendChild(self.dom.createTextNode("[")) + right.appendChild(self.dom.createTextNode("]")) + else: + left.appendChild(self.dom.createTextNode("(")) + right.appendChild(self.dom.createTextNode(")")) + mrow = self.dom.createElement('mrow') + mrow.appendChild(left) + mrow.appendChild(table) + mrow.appendChild(right) + return mrow + + def _get_printed_Rational(self, e, folded=None): + if e.p < 0: + p = -e.p + else: + p = e.p + x = self.dom.createElement('mfrac') + if folded or self._settings["fold_short_frac"]: + x.setAttribute('bevelled', 'true') + x.appendChild(self._print(p)) + x.appendChild(self._print(e.q)) + if e.p < 0: + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('-')) + mrow.appendChild(mo) + mrow.appendChild(x) + return mrow + else: + return x + + def _print_Rational(self, e): + if e.q == 1: + # don't divide + return self._print(e.p) + + return self._get_printed_Rational(e, self._settings["fold_short_frac"]) + + def _print_Limit(self, e): + mrow = self.dom.createElement('mrow') + munder = self.dom.createElement('munder') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('lim')) + + x = self.dom.createElement('mrow') + x_1 = self._print(e.args[1]) + arrow = self.dom.createElement('mo') + arrow.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + x_2 = self._print(e.args[2]) + x.appendChild(x_1) + x.appendChild(arrow) + x.appendChild(x_2) + + munder.appendChild(mi) + munder.appendChild(x) + mrow.appendChild(munder) + mrow.appendChild(self._print(e.args[0])) + + return mrow + + def _print_ImaginaryUnit(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('ⅈ')) + return x + + def _print_GoldenRatio(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('Φ')) + return x + + def _print_Exp1(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('ⅇ')) + return x + + def _print_Pi(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('π')) + return x + + def _print_Infinity(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('∞')) + return x + + def _print_NegativeInfinity(self, e): + mrow = self.dom.createElement('mrow') + y = self.dom.createElement('mo') + y.appendChild(self.dom.createTextNode('-')) + x = self._print_Infinity(e) + mrow.appendChild(y) + mrow.appendChild(x) + return mrow + + def _print_HBar(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('ℏ')) + return x + + def _print_EulerGamma(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('γ')) + return x + + def _print_TribonacciConstant(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('TribonacciConstant')) + return x + + def _print_Dagger(self, e): + msup = self.dom.createElement('msup') + msup.appendChild(self._print(e.args[0])) + msup.appendChild(self.dom.createTextNode('†')) + return msup + + def _print_Contains(self, e): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._print(e.args[0])) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∈')) + mrow.appendChild(mo) + mrow.appendChild(self._print(e.args[1])) + return mrow + + def _print_HilbertSpace(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('ℋ')) + return x + + def _print_ComplexSpace(self, e): + msup = self.dom.createElement('msup') + msup.appendChild(self.dom.createTextNode('𝒞')) + msup.appendChild(self._print(e.args[0])) + return msup + + def _print_FockSpace(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('ℱ')) + return x + + + def _print_Integral(self, expr): + intsymbols = {1: "∫", 2: "∬", 3: "∭"} + + mrow = self.dom.createElement('mrow') + if len(expr.limits) <= 3 and all(len(lim) == 1 for lim in expr.limits): + # Only up to three-integral signs exists + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(intsymbols[len(expr.limits)])) + mrow.appendChild(mo) + else: + # Either more than three or limits provided + for lim in reversed(expr.limits): + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(intsymbols[1])) + if len(lim) == 1: + mrow.appendChild(mo) + if len(lim) == 2: + msup = self.dom.createElement('msup') + msup.appendChild(mo) + msup.appendChild(self._print(lim[1])) + mrow.appendChild(msup) + if len(lim) == 3: + msubsup = self.dom.createElement('msubsup') + msubsup.appendChild(mo) + msubsup.appendChild(self._print(lim[1])) + msubsup.appendChild(self._print(lim[2])) + mrow.appendChild(msubsup) + # print function + mrow.appendChild(self.parenthesize(expr.function, PRECEDENCE["Mul"], + strict=True)) + # print integration variables + for lim in reversed(expr.limits): + d = self.dom.createElement('mo') + d.appendChild(self.dom.createTextNode('ⅆ')) + mrow.appendChild(d) + mrow.appendChild(self._print(lim[0])) + return mrow + + def _print_Sum(self, e): + limits = list(e.limits) + subsup = self.dom.createElement('munderover') + low_elem = self._print(limits[0][1]) + up_elem = self._print(limits[0][2]) + summand = self.dom.createElement('mo') + summand.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + + low = self.dom.createElement('mrow') + var = self._print(limits[0][0]) + equal = self.dom.createElement('mo') + equal.appendChild(self.dom.createTextNode('=')) + low.appendChild(var) + low.appendChild(equal) + low.appendChild(low_elem) + + subsup.appendChild(summand) + subsup.appendChild(low) + subsup.appendChild(up_elem) + + mrow = self.dom.createElement('mrow') + mrow.appendChild(subsup) + mrow.appendChild(self.parenthesize(e.function, precedence_traditional(e))) + return mrow + + def _print_Symbol(self, sym, style='plain'): + def join(items): + if len(items) > 1: + mrow = self.dom.createElement('mrow') + for i, item in enumerate(items): + if i > 0: + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(" ")) + mrow.appendChild(mo) + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(item)) + mrow.appendChild(mi) + return mrow + else: + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(items[0])) + return mi + + # translate name, supers and subs to unicode characters + def translate(s): + if s in greek_unicode: + return greek_unicode.get(s) + else: + return s + + name, supers, subs = self._split_super_sub(sym.name) + name = translate(name) + supers = [translate(sup) for sup in supers] + subs = [translate(sub) for sub in subs] + + mname = self.dom.createElement('mi') + mname.appendChild(self.dom.createTextNode(name)) + if len(supers) == 0: + if len(subs) == 0: + x = mname + else: + x = self.dom.createElement('msub') + x.appendChild(mname) + x.appendChild(join(subs)) + else: + if len(subs) == 0: + x = self.dom.createElement('msup') + x.appendChild(mname) + x.appendChild(join(supers)) + else: + x = self.dom.createElement('msubsup') + x.appendChild(mname) + x.appendChild(join(subs)) + x.appendChild(join(supers)) + # Set bold font? + if style == 'bold': + x.setAttribute('mathvariant', 'bold') + return x + + def _print_MatrixSymbol(self, sym): + return self._print_Symbol(sym, + style=self._settings['mat_symbol_style']) + + _print_RandomSymbol = _print_Symbol + + def _print_conjugate(self, expr): + enc = self.dom.createElement('menclose') + enc.setAttribute('notation', 'top') + enc.appendChild(self._print(expr.args[0])) + return enc + + def _print_operator_after(self, op, expr): + row = self.dom.createElement('mrow') + row.appendChild(self.parenthesize(expr, PRECEDENCE["Func"])) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(op)) + row.appendChild(mo) + return row + + def _print_factorial(self, expr): + return self._print_operator_after('!', expr.args[0]) + + def _print_factorial2(self, expr): + return self._print_operator_after('!!', expr.args[0]) + + def _print_binomial(self, expr): + frac = self.dom.createElement('mfrac') + frac.setAttribute('linethickness', '0') + frac.appendChild(self._print(expr.args[0])) + frac.appendChild(self._print(expr.args[1])) + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(frac) + brac.appendChild(self._r_paren()) + return brac + + def _print_Pow(self, e): + # Here we use root instead of power if the exponent is the + # reciprocal of an integer + if (e.exp.is_Rational and abs(e.exp.p) == 1 and e.exp.q != 1 and + self._settings['root_notation']): + if e.exp.q == 2: + x = self.dom.createElement('msqrt') + x.appendChild(self._print(e.base)) + if e.exp.q != 2: + x = self.dom.createElement('mroot') + x.appendChild(self._print(e.base)) + x.appendChild(self._print(e.exp.q)) + if e.exp.p == -1: + frac = self.dom.createElement('mfrac') + frac.appendChild(self._print(1)) + frac.appendChild(x) + return frac + else: + return x + + if e.exp.is_Rational and e.exp.q != 1: + if e.exp.is_negative: + top = self.dom.createElement('mfrac') + top.appendChild(self._print(1)) + x = self.dom.createElement('msup') + x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) + x.appendChild(self._get_printed_Rational(-e.exp, + self._settings['fold_frac_powers'])) + top.appendChild(x) + return top + else: + x = self.dom.createElement('msup') + x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) + x.appendChild(self._get_printed_Rational(e.exp, + self._settings['fold_frac_powers'])) + return x + + if e.exp.is_negative: + top = self.dom.createElement('mfrac') + top.appendChild(self._print(1)) + if e.exp == -1: + top.appendChild(self._print(e.base)) + else: + x = self.dom.createElement('msup') + x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) + x.appendChild(self._print(-e.exp)) + top.appendChild(x) + return top + + x = self.dom.createElement('msup') + x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow'])) + x.appendChild(self._print(e.exp)) + return x + + def _print_Number(self, e): + x = self.dom.createElement(self.mathml_tag(e)) + x.appendChild(self.dom.createTextNode(str(e))) + return x + + def _print_AccumulationBounds(self, i): + left = self.dom.createElement('mo') + left.appendChild(self.dom.createTextNode('\u27e8')) + right = self.dom.createElement('mo') + right.appendChild(self.dom.createTextNode('\u27e9')) + brac = self.dom.createElement('mrow') + brac.appendChild(left) + brac.appendChild(self._print(i.min)) + brac.appendChild(self._comma()) + brac.appendChild(self._print(i.max)) + brac.appendChild(right) + return brac + + def _print_Derivative(self, e): + + if requires_partial(e.expr): + d = '∂' + else: + d = self.mathml_tag(e) + + # Determine denominator + m = self.dom.createElement('mrow') + dim = 0 # Total diff dimension, for numerator + for sym, num in reversed(e.variable_count): + dim += num + if num >= 2: + x = self.dom.createElement('msup') + xx = self.dom.createElement('mo') + xx.appendChild(self.dom.createTextNode(d)) + x.appendChild(xx) + x.appendChild(self._print(num)) + else: + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode(d)) + m.appendChild(x) + y = self._print(sym) + m.appendChild(y) + + mnum = self.dom.createElement('mrow') + if dim >= 2: + x = self.dom.createElement('msup') + xx = self.dom.createElement('mo') + xx.appendChild(self.dom.createTextNode(d)) + x.appendChild(xx) + x.appendChild(self._print(dim)) + else: + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode(d)) + + mnum.appendChild(x) + mrow = self.dom.createElement('mrow') + frac = self.dom.createElement('mfrac') + frac.appendChild(mnum) + frac.appendChild(m) + mrow.appendChild(frac) + + # Print function + mrow.appendChild(self._print(e.expr)) + + return mrow + + def _print_Function(self, e): + x = self.dom.createElement('mi') + if self.mathml_tag(e) == 'log' and self._settings["ln_notation"]: + x.appendChild(self.dom.createTextNode('ln')) + else: + x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + mrow = self.dom.createElement('mrow') + mrow.appendChild(x) + mrow.appendChild(self._paren_comma_separated(*e.args)) + return mrow + + def _print_Float(self, expr): + # Based off of that in StrPrinter + dps = prec_to_dps(expr._prec) + str_real = mlib_to_str(expr._mpf_, dps, strip_zeros=True) + + # Must always have a mul symbol (as 2.5 10^{20} just looks odd) + # thus we use the number separator + separator = self._settings['mul_symbol_mathml_numbers'] + mrow = self.dom.createElement('mrow') + if 'e' in str_real: + (mant, exp) = str_real.split('e') + + if exp[0] == '+': + exp = exp[1:] + + mn = self.dom.createElement('mn') + mn.appendChild(self.dom.createTextNode(mant)) + mrow.appendChild(mn) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode(separator)) + mrow.appendChild(mo) + msup = self.dom.createElement('msup') + mn = self.dom.createElement('mn') + mn.appendChild(self.dom.createTextNode("10")) + msup.appendChild(mn) + mn = self.dom.createElement('mn') + mn.appendChild(self.dom.createTextNode(exp)) + msup.appendChild(mn) + mrow.appendChild(msup) + return mrow + elif str_real == "+inf": + return self._print_Infinity(None) + elif str_real == "-inf": + return self._print_NegativeInfinity(None) + else: + mn = self.dom.createElement('mn') + mn.appendChild(self.dom.createTextNode(str_real)) + return mn + + def _print_polylog(self, expr): + mrow = self.dom.createElement('mrow') + m = self.dom.createElement('msub') + + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('Li')) + m.appendChild(mi) + m.appendChild(self._print(expr.args[0])) + mrow.appendChild(m) + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(expr.args[1])) + brac.appendChild(self._r_paren()) + mrow.appendChild(brac) + return mrow + + def _print_Basic(self, e): + mrow = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + mrow.appendChild(mi) + mrow.appendChild(self._paren_comma_separated(*e.args)) + return mrow + + def _print_Tuple(self, e): + return self._paren_comma_separated(*e.args) + + def _print_Interval(self, i): + right = self.dom.createElement('mo') + if i.right_open: + right.appendChild(self.dom.createTextNode(')')) + else: + right.appendChild(self.dom.createTextNode(']')) + left = self.dom.createElement('mo') + if i.left_open: + left.appendChild(self.dom.createTextNode('(')) + else: + left.appendChild(self.dom.createTextNode('[')) + mrow = self.dom.createElement('mrow') + mrow.appendChild(left) + mrow.appendChild(self._print(i.start)) + mrow.appendChild(self._comma()) + mrow.appendChild(self._print(i.end)) + mrow.appendChild(right) + return mrow + + def _print_Abs(self, expr, exp=None): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._bar()) + mrow.appendChild(self._print(expr.args[0])) + mrow.appendChild(self._bar()) + return mrow + + _print_Determinant = _print_Abs + + def _print_re_im(self, c, expr): + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(expr)) + brac.appendChild(self._r_paren()) + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(c)) + mrow = self.dom.createElement('mrow') + mrow.appendChild(mi) + mrow.appendChild(brac) + return mrow + + def _print_re(self, expr, exp=None): + return self._print_re_im('\u211C', expr.args[0]) + + def _print_im(self, expr, exp=None): + return self._print_re_im('\u2111', expr.args[0]) + + def _print_AssocOp(self, e): + mrow = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + mrow.appendChild(mi) + for arg in e.args: + mrow.appendChild(self._print(arg)) + return mrow + + def _print_SetOp(self, expr, symbol, prec): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self.parenthesize(expr.args[0], prec)) + for arg in expr.args[1:]: + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode(symbol)) + y = self.parenthesize(arg, prec) + mrow.appendChild(x) + mrow.appendChild(y) + return mrow + + def _print_Union(self, expr): + prec = PRECEDENCE_TRADITIONAL['Union'] + return self._print_SetOp(expr, '∪', prec) + + def _print_Intersection(self, expr): + prec = PRECEDENCE_TRADITIONAL['Intersection'] + return self._print_SetOp(expr, '∩', prec) + + def _print_Complement(self, expr): + prec = PRECEDENCE_TRADITIONAL['Complement'] + return self._print_SetOp(expr, '∖', prec) + + def _print_SymmetricDifference(self, expr): + prec = PRECEDENCE_TRADITIONAL['SymmetricDifference'] + return self._print_SetOp(expr, '∆', prec) + + def _print_ProductSet(self, expr): + prec = PRECEDENCE_TRADITIONAL['ProductSet'] + return self._print_SetOp(expr, '×', prec) + + def _print_FiniteSet(self, s): + return self._print_set(s.args) + + def _print_set(self, s): + items = sorted(s, key=default_sort_key) + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_brace()) + for i, item in enumerate(items): + if i: + brac.appendChild(self._comma()) + brac.appendChild(self._print(item)) + brac.appendChild(self._r_brace()) + return brac + + _print_frozenset = _print_set + + def _print_LogOp(self, args, symbol): + mrow = self.dom.createElement('mrow') + if args[0].is_Boolean and not args[0].is_Not: + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(args[0])) + brac.appendChild(self._r_paren()) + mrow.appendChild(brac) + else: + mrow.appendChild(self._print(args[0])) + for arg in args[1:]: + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode(symbol)) + if arg.is_Boolean and not arg.is_Not: + y = self.dom.createElement('mrow') + y.appendChild(self._l_paren()) + y.appendChild(self._print(arg)) + y.appendChild(self._r_paren()) + else: + y = self._print(arg) + mrow.appendChild(x) + mrow.appendChild(y) + return mrow + + def _print_BasisDependent(self, expr): + from sympy.vector import Vector + + if expr == expr.zero: + # Not clear if this is ever called + return self._print(expr.zero) + if isinstance(expr, Vector): + items = expr.separate().items() + else: + items = [(0, expr)] + + mrow = self.dom.createElement('mrow') + for system, vect in items: + inneritems = list(vect.components.items()) + inneritems.sort(key = lambda x:x[0].__str__()) + for i, (k, v) in enumerate(inneritems): + if v == 1: + if i: # No + for first item + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('+')) + mrow.appendChild(mo) + mrow.appendChild(self._print(k)) + elif v == -1: + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('-')) + mrow.appendChild(mo) + mrow.appendChild(self._print(k)) + else: + if i: # No + for first item + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('+')) + mrow.appendChild(mo) + mbrac = self.dom.createElement('mrow') + mbrac.appendChild(self._l_paren()) + mbrac.appendChild(self._print(v)) + mbrac.appendChild(self._r_paren()) + mrow.appendChild(mbrac) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('⁢')) + mrow.appendChild(mo) + mrow.appendChild(self._print(k)) + return mrow + + + def _print_And(self, expr): + args = sorted(expr.args, key=default_sort_key) + return self._print_LogOp(args, '∧') + + def _print_Or(self, expr): + args = sorted(expr.args, key=default_sort_key) + return self._print_LogOp(args, '∨') + + def _print_Xor(self, expr): + args = sorted(expr.args, key=default_sort_key) + return self._print_LogOp(args, '⊻') + + def _print_Implies(self, expr): + return self._print_LogOp(expr.args, '⇒') + + def _print_Equivalent(self, expr): + args = sorted(expr.args, key=default_sort_key) + return self._print_LogOp(args, '⇔') + + def _print_Not(self, e): + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('¬')) + mrow.appendChild(mo) + if (e.args[0].is_Boolean): + x = self.dom.createElement('mrow') + x.appendChild(self._l_paren()) + x.appendChild(self._print(e.args[0])) + x.appendChild(self._r_paren()) + else: + x = self._print(e.args[0]) + mrow.appendChild(x) + return mrow + + def _print_bool(self, e): + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + return mi + + _print_BooleanTrue = _print_bool + _print_BooleanFalse = _print_bool + + def _print_NoneType(self, e): + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + return mi + + def _print_Range(self, s): + dots = "\u2026" + if s.start.is_infinite and s.stop.is_infinite: + if s.step.is_positive: + printset = dots, -1, 0, 1, dots + else: + printset = dots, 1, 0, -1, dots + elif s.start.is_infinite: + printset = dots, s[-1] - s.step, s[-1] + elif s.stop.is_infinite: + it = iter(s) + printset = next(it), next(it), dots + elif len(s) > 4: + it = iter(s) + printset = next(it), next(it), dots, s[-1] + else: + printset = tuple(s) + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_brace()) + for i, el in enumerate(printset): + if i: + brac.appendChild(self._comma()) + if el == dots: + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(dots)) + brac.appendChild(mi) + else: + brac.appendChild(self._print(el)) + brac.appendChild(self._r_brace()) + return brac + + def _hprint_variadic_function(self, expr): + args = sorted(expr.args, key=default_sort_key) + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode((str(expr.func)).lower())) + mrow.appendChild(mo) + mrow.appendChild(self._paren_comma_separated(*args)) + return mrow + + _print_Min = _print_Max = _hprint_variadic_function + + def _print_exp(self, expr): + msup = self.dom.createElement('msup') + msup.appendChild(self._print_Exp1(None)) + msup.appendChild(self._print(expr.args[0])) + return msup + + def _print_Relational(self, e): + mrow = self.dom.createElement('mrow') + mrow.appendChild(self._print(e.lhs)) + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode(self.mathml_tag(e))) + mrow.appendChild(x) + mrow.appendChild(self._print(e.rhs)) + return mrow + + def _print_int(self, p): + dom_element = self.dom.createElement(self.mathml_tag(p)) + dom_element.appendChild(self.dom.createTextNode(str(p))) + return dom_element + + def _print_BaseScalar(self, e): + msub = self.dom.createElement('msub') + index, system = e._id + mi = self.dom.createElement('mi') + mi.setAttribute('mathvariant', 'bold') + mi.appendChild(self.dom.createTextNode(system._variable_names[index])) + msub.appendChild(mi) + mi = self.dom.createElement('mi') + mi.setAttribute('mathvariant', 'bold') + mi.appendChild(self.dom.createTextNode(system._name)) + msub.appendChild(mi) + return msub + + def _print_BaseVector(self, e): + msub = self.dom.createElement('msub') + index, system = e._id + mover = self.dom.createElement('mover') + mi = self.dom.createElement('mi') + mi.setAttribute('mathvariant', 'bold') + mi.appendChild(self.dom.createTextNode(system._vector_names[index])) + mover.appendChild(mi) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('^')) + mover.appendChild(mo) + msub.appendChild(mover) + mi = self.dom.createElement('mi') + mi.setAttribute('mathvariant', 'bold') + mi.appendChild(self.dom.createTextNode(system._name)) + msub.appendChild(mi) + return msub + + def _print_VectorZero(self, e): + mover = self.dom.createElement('mover') + mi = self.dom.createElement('mi') + mi.setAttribute('mathvariant', 'bold') + mi.appendChild(self.dom.createTextNode("0")) + mover.appendChild(mi) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('^')) + mover.appendChild(mo) + return mover + + def _print_Cross(self, expr): + mrow = self.dom.createElement('mrow') + vec1 = expr._expr1 + vec2 = expr._expr2 + mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('×')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) + return mrow + + def _print_Curl(self, expr): + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∇')) + mrow.appendChild(mo) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('×')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) + return mrow + + def _print_Divergence(self, expr): + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∇')) + mrow.appendChild(mo) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('·')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) + return mrow + + def _print_Dot(self, expr): + mrow = self.dom.createElement('mrow') + vec1 = expr._expr1 + vec2 = expr._expr2 + mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul'])) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('·')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul'])) + return mrow + + def _print_Gradient(self, expr): + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∇')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) + return mrow + + def _print_Laplacian(self, expr): + mrow = self.dom.createElement('mrow') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∆')) + mrow.appendChild(mo) + mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul'])) + return mrow + + def _print_Integers(self, e): + x = self.dom.createElement('mi') + x.setAttribute('mathvariant', 'normal') + x.appendChild(self.dom.createTextNode('ℤ')) + return x + + def _print_Complexes(self, e): + x = self.dom.createElement('mi') + x.setAttribute('mathvariant', 'normal') + x.appendChild(self.dom.createTextNode('ℂ')) + return x + + def _print_Reals(self, e): + x = self.dom.createElement('mi') + x.setAttribute('mathvariant', 'normal') + x.appendChild(self.dom.createTextNode('ℝ')) + return x + + def _print_Naturals(self, e): + x = self.dom.createElement('mi') + x.setAttribute('mathvariant', 'normal') + x.appendChild(self.dom.createTextNode('ℕ')) + return x + + def _print_Naturals0(self, e): + sub = self.dom.createElement('msub') + x = self.dom.createElement('mi') + x.setAttribute('mathvariant', 'normal') + x.appendChild(self.dom.createTextNode('ℕ')) + sub.appendChild(x) + sub.appendChild(self._print(S.Zero)) + return sub + + def _print_SingularityFunction(self, expr): + shift = expr.args[0] - expr.args[1] + power = expr.args[2] + left = self.dom.createElement('mo') + left.appendChild(self.dom.createTextNode('\u27e8')) + right = self.dom.createElement('mo') + right.appendChild(self.dom.createTextNode('\u27e9')) + brac = self.dom.createElement('mrow') + brac.appendChild(left) + brac.appendChild(self._print(shift)) + brac.appendChild(right) + sup = self.dom.createElement('msup') + sup.appendChild(brac) + sup.appendChild(self._print(power)) + return sup + + def _print_NaN(self, e): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('NaN')) + return x + + def _print_number_function(self, e, name): + # Print name_arg[0] for one argument or name_arg[0](arg[1]) + # for more than one argument + sub = self.dom.createElement('msub') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode(name)) + sub.appendChild(mi) + sub.appendChild(self._print(e.args[0])) + if len(e.args) == 1: + return sub + mrow = self.dom.createElement('mrow') + mrow.appendChild(sub) + mrow.appendChild(self._paren_comma_separated(*e.args[1:])) + return mrow + + def _print_bernoulli(self, e): + return self._print_number_function(e, 'B') + + _print_bell = _print_bernoulli + + def _print_catalan(self, e): + return self._print_number_function(e, 'C') + + def _print_euler(self, e): + return self._print_number_function(e, 'E') + + def _print_fibonacci(self, e): + return self._print_number_function(e, 'F') + + def _print_lucas(self, e): + return self._print_number_function(e, 'L') + + def _print_stieltjes(self, e): + return self._print_number_function(e, 'γ') + + def _print_tribonacci(self, e): + return self._print_number_function(e, 'T') + + def _print_ComplexInfinity(self, e): + x = self.dom.createElement('mover') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∞')) + x.appendChild(mo) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('~')) + x.appendChild(mo) + return x + + def _print_EmptySet(self, e): + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode('∅')) + return x + + def _print_UniversalSet(self, e): + x = self.dom.createElement('mo') + x.appendChild(self.dom.createTextNode('𝕌')) + return x + + def _print_Adjoint(self, expr): + from sympy.matrices import MatrixSymbol + mat = expr.arg + sup = self.dom.createElement('msup') + if not isinstance(mat, MatrixSymbol): + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(mat)) + brac.appendChild(self._r_paren()) + sup.appendChild(brac) + else: + sup.appendChild(self._print(mat)) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('†')) + sup.appendChild(mo) + return sup + + def _print_Transpose(self, expr): + from sympy.matrices import MatrixSymbol + mat = expr.arg + sup = self.dom.createElement('msup') + if not isinstance(mat, MatrixSymbol): + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(mat)) + brac.appendChild(self._r_paren()) + sup.appendChild(brac) + else: + sup.appendChild(self._print(mat)) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('T')) + sup.appendChild(mo) + return sup + + def _print_Inverse(self, expr): + from sympy.matrices import MatrixSymbol + mat = expr.arg + sup = self.dom.createElement('msup') + if not isinstance(mat, MatrixSymbol): + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(mat)) + brac.appendChild(self._r_paren()) + sup.appendChild(brac) + else: + sup.appendChild(self._print(mat)) + sup.appendChild(self._print(-1)) + return sup + + def _print_MatMul(self, expr): + from sympy.matrices.expressions.matmul import MatMul + + x = self.dom.createElement('mrow') + args = expr.args + if isinstance(args[0], Mul): + args = args[0].as_ordered_factors() + list(args[1:]) + else: + args = list(args) + + if isinstance(expr, MatMul) and expr.could_extract_minus_sign(): + if args[0] == -1: + args = args[1:] + else: + args[0] = -args[0] + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('-')) + x.appendChild(mo) + + for arg in args[:-1]: + x.appendChild(self.parenthesize(arg, precedence_traditional(expr), + False)) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('⁢')) + x.appendChild(mo) + x.appendChild(self.parenthesize(args[-1], precedence_traditional(expr), + False)) + return x + + def _print_MatPow(self, expr): + from sympy.matrices import MatrixSymbol + base, exp = expr.base, expr.exp + sup = self.dom.createElement('msup') + if not isinstance(base, MatrixSymbol): + brac = self.dom.createElement('mrow') + brac.appendChild(self._l_paren()) + brac.appendChild(self._print(base)) + brac.appendChild(self._r_paren()) + sup.appendChild(brac) + else: + sup.appendChild(self._print(base)) + sup.appendChild(self._print(exp)) + return sup + + def _print_HadamardProduct(self, expr): + x = self.dom.createElement('mrow') + args = expr.args + for arg in args[:-1]: + x.appendChild( + self.parenthesize(arg, precedence_traditional(expr), False)) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('∘')) + x.appendChild(mo) + x.appendChild( + self.parenthesize(args[-1], precedence_traditional(expr), False)) + return x + + def _print_ZeroMatrix(self, Z): + x = self.dom.createElement('mn') + x.appendChild(self.dom.createTextNode('𝟘')) + return x + + def _print_OneMatrix(self, Z): + x = self.dom.createElement('mn') + x.appendChild(self.dom.createTextNode('𝟙')) + return x + + def _print_Identity(self, I): + x = self.dom.createElement('mi') + x.appendChild(self.dom.createTextNode('𝕀')) + return x + + def _print_floor(self, e): + left = self.dom.createElement('mo') + left.appendChild(self.dom.createTextNode('\u230A')) + right = self.dom.createElement('mo') + right.appendChild(self.dom.createTextNode('\u230B')) + mrow = self.dom.createElement('mrow') + mrow.appendChild(left) + mrow.appendChild(self._print(e.args[0])) + mrow.appendChild(right) + return mrow + + def _print_ceiling(self, e): + left = self.dom.createElement('mo') + left.appendChild(self.dom.createTextNode('\u2308')) + right = self.dom.createElement('mo') + right.appendChild(self.dom.createTextNode('\u2309')) + mrow = self.dom.createElement('mrow') + mrow.appendChild(left) + mrow.appendChild(self._print(e.args[0])) + mrow.appendChild(right) + return mrow + + def _print_Lambda(self, e): + mrow = self.dom.createElement('mrow') + symbols = e.args[0] + if len(symbols) == 1: + symbols = self._print(symbols[0]) + else: + symbols = self._print(symbols) + mrow.appendChild(self._l_paren()) + mrow.appendChild(symbols) + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('↦')) + mrow.appendChild(mo) + mrow.appendChild(self._print(e.args[1])) + mrow.appendChild(self._r_paren()) + return mrow + + def _print_tuple(self, e): + return self._paren_comma_separated(*e) + + def _print_IndexedBase(self, e): + return self._print(e.label) + + def _print_Indexed(self, e): + x = self.dom.createElement('msub') + x.appendChild(self._print(e.base)) + if len(e.indices) == 1: + x.appendChild(self._print(e.indices[0])) + return x + x.appendChild(self._print(e.indices)) + return x + + def _print_MatrixElement(self, e): + x = self.dom.createElement('msub') + x.appendChild(self.parenthesize(e.parent, PRECEDENCE["Atom"], strict = True)) + brac = self.dom.createElement('mrow') + for i, arg in enumerate(e.indices): + if i: + brac.appendChild(self._comma()) + brac.appendChild(self._print(arg)) + x.appendChild(brac) + return x + + def _print_elliptic_f(self, e): + x = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('𝖥')) + x.appendChild(mi) + x.appendChild(self._paren_bar_separated(*e.args)) + return x + + def _print_elliptic_e(self, e): + x = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('𝖤')) + x.appendChild(mi) + x.appendChild(self._paren_bar_separated(*e.args)) + return x + + def _print_elliptic_pi(self, e): + x = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('𝛱')) + x.appendChild(mi) + y = self.dom.createElement('mrow') + y.appendChild(self._l_paren()) + if len(e.args) == 2: + n, m = e.args + y.appendChild(self._print(n)) + y.appendChild(self._bar()) + y.appendChild(self._print(m)) + else: + n, m, z = e.args + y.appendChild(self._print(n)) + y.appendChild(self._semicolon()) + y.appendChild(self._print(m)) + y.appendChild(self._bar()) + y.appendChild(self._print(z)) + y.appendChild(self._r_paren()) + x.appendChild(y) + return x + + def _print_Ei(self, e): + x = self.dom.createElement('mrow') + mi = self.dom.createElement('mi') + mi.appendChild(self.dom.createTextNode('Ei')) + x.appendChild(mi) + x.appendChild(self._print(e.args)) + return x + + def _print_expint(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('E')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + def _print_jacobi(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msubsup') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('P')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + y.appendChild(self._print(e.args[1:3])) + x.appendChild(y) + x.appendChild(self._print(e.args[3:])) + return x + + def _print_gegenbauer(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msubsup') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('C')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + y.appendChild(self._print(e.args[1:2])) + x.appendChild(y) + x.appendChild(self._print(e.args[2:])) + return x + + def _print_chebyshevt(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('T')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + def _print_chebyshevu(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('U')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + def _print_legendre(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('P')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + def _print_assoc_legendre(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msubsup') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('P')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + y.appendChild(self._print(e.args[1:2])) + x.appendChild(y) + x.appendChild(self._print(e.args[2:])) + return x + + def _print_laguerre(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('L')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + def _print_assoc_laguerre(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msubsup') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('L')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + y.appendChild(self._print(e.args[1:2])) + x.appendChild(y) + x.appendChild(self._print(e.args[2:])) + return x + + def _print_hermite(self, e): + x = self.dom.createElement('mrow') + y = self.dom.createElement('msub') + mo = self.dom.createElement('mo') + mo.appendChild(self.dom.createTextNode('H')) + y.appendChild(mo) + y.appendChild(self._print(e.args[0])) + x.appendChild(y) + x.appendChild(self._print(e.args[1:])) + return x + + +@print_function(MathMLPrinterBase) +def mathml(expr, printer='content', **settings): + """Returns the MathML representation of expr. If printer is presentation + then prints Presentation MathML else prints content MathML. + """ + if printer == 'presentation': + return MathMLPresentationPrinter(settings).doprint(expr) + else: + return MathMLContentPrinter(settings).doprint(expr) + + +def print_mathml(expr, printer='content', **settings): + """ + Prints a pretty representation of the MathML code for expr. If printer is + presentation then prints Presentation MathML else prints content MathML. + + Examples + ======== + + >>> ## + >>> from sympy import print_mathml + >>> from sympy.abc import x + >>> print_mathml(x+1) #doctest: +NORMALIZE_WHITESPACE + + + x + 1 + + >>> print_mathml(x+1, printer='presentation') + + x + + + 1 + + + """ + if printer == 'presentation': + s = MathMLPresentationPrinter(settings) + else: + s = MathMLContentPrinter(settings) + xml = s._print(sympify(expr)) + pretty_xml = xml.toprettyxml() + + print(pretty_xml) + + +# For backward compatibility +MathMLPrinter = MathMLContentPrinter diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/numpy.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/numpy.py new file mode 100644 index 0000000000000000000000000000000000000000..1ff68454bb287bc0a1d2dfc1fe68fb05b3c22a74 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/numpy.py @@ -0,0 +1,541 @@ +from sympy.core import S +from sympy.core.function import Lambda +from sympy.core.power import Pow +from .pycode import PythonCodePrinter, _known_functions_math, _print_known_const, _print_known_func, _unpack_integral_limits, ArrayPrinter +from .codeprinter import CodePrinter + + +_not_in_numpy = 'erf erfc factorial gamma loggamma'.split() +_in_numpy = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_numpy] +_known_functions_numpy = dict(_in_numpy, **{ + 'acos': 'arccos', + 'acosh': 'arccosh', + 'asin': 'arcsin', + 'asinh': 'arcsinh', + 'atan': 'arctan', + 'atan2': 'arctan2', + 'atanh': 'arctanh', + 'exp2': 'exp2', + 'sign': 'sign', + 'logaddexp': 'logaddexp', + 'logaddexp2': 'logaddexp2', + 'isinf': 'isinf', + 'isnan': 'isnan', + +}) +_known_constants_numpy = { + 'Exp1': 'e', + 'Pi': 'pi', + 'EulerGamma': 'euler_gamma', + 'NaN': 'nan', + 'Infinity': 'inf', +} + +_numpy_known_functions = {k: 'numpy.' + v for k, v in _known_functions_numpy.items()} +_numpy_known_constants = {k: 'numpy.' + v for k, v in _known_constants_numpy.items()} + +class NumPyPrinter(ArrayPrinter, PythonCodePrinter): + """ + Numpy printer which handles vectorized piecewise functions, + logical operators, etc. + """ + + _module = 'numpy' + _kf = _numpy_known_functions + _kc = _numpy_known_constants + + def __init__(self, settings=None): + """ + `settings` is passed to CodePrinter.__init__() + `module` specifies the array module to use, currently 'NumPy', 'CuPy' + or 'JAX'. + """ + self.language = "Python with {}".format(self._module) + self.printmethod = "_{}code".format(self._module) + + self._kf = {**PythonCodePrinter._kf, **self._kf} + + super().__init__(settings=settings) + + + def _print_seq(self, seq): + "General sequence printer: converts to tuple" + # Print tuples here instead of lists because numba supports + # tuples in nopython mode. + delimiter=', ' + return '({},)'.format(delimiter.join(self._print(item) for item in seq)) + + def _print_NegativeInfinity(self, expr): + return '-' + self._print(S.Infinity) + + def _print_MatMul(self, expr): + "Matrix multiplication printer" + if expr.as_coeff_matrices()[0] is not S.One: + expr_list = expr.as_coeff_matrices()[1]+[(expr.as_coeff_matrices()[0])] + return '({})'.format(').dot('.join(self._print(i) for i in expr_list)) + return '({})'.format(').dot('.join(self._print(i) for i in expr.args)) + + def _print_MatPow(self, expr): + "Matrix power printer" + return '{}({}, {})'.format(self._module_format(self._module + '.linalg.matrix_power'), + self._print(expr.args[0]), self._print(expr.args[1])) + + def _print_Inverse(self, expr): + "Matrix inverse printer" + return '{}({})'.format(self._module_format(self._module + '.linalg.inv'), + self._print(expr.args[0])) + + def _print_DotProduct(self, expr): + # DotProduct allows any shape order, but numpy.dot does matrix + # multiplication, so we have to make sure it gets 1 x n by n x 1. + arg1, arg2 = expr.args + if arg1.shape[0] != 1: + arg1 = arg1.T + if arg2.shape[1] != 1: + arg2 = arg2.T + + return "%s(%s, %s)" % (self._module_format(self._module + '.dot'), + self._print(arg1), + self._print(arg2)) + + def _print_MatrixSolve(self, expr): + return "%s(%s, %s)" % (self._module_format(self._module + '.linalg.solve'), + self._print(expr.matrix), + self._print(expr.vector)) + + def _print_ZeroMatrix(self, expr): + return '{}({})'.format(self._module_format(self._module + '.zeros'), + self._print(expr.shape)) + + def _print_OneMatrix(self, expr): + return '{}({})'.format(self._module_format(self._module + '.ones'), + self._print(expr.shape)) + + def _print_FunctionMatrix(self, expr): + from sympy.abc import i, j + lamda = expr.lamda + if not isinstance(lamda, Lambda): + lamda = Lambda((i, j), lamda(i, j)) + return '{}(lambda {}: {}, {})'.format(self._module_format(self._module + '.fromfunction'), + ', '.join(self._print(arg) for arg in lamda.args[0]), + self._print(lamda.args[1]), self._print(expr.shape)) + + def _print_HadamardProduct(self, expr): + func = self._module_format(self._module + '.multiply') + return ''.join('{}({}, '.format(func, self._print(arg)) \ + for arg in expr.args[:-1]) + "{}{}".format(self._print(expr.args[-1]), + ')' * (len(expr.args) - 1)) + + def _print_KroneckerProduct(self, expr): + func = self._module_format(self._module + '.kron') + return ''.join('{}({}, '.format(func, self._print(arg)) \ + for arg in expr.args[:-1]) + "{}{}".format(self._print(expr.args[-1]), + ')' * (len(expr.args) - 1)) + + def _print_Adjoint(self, expr): + return '{}({}({}))'.format( + self._module_format(self._module + '.conjugate'), + self._module_format(self._module + '.transpose'), + self._print(expr.args[0])) + + def _print_DiagonalOf(self, expr): + vect = '{}({})'.format( + self._module_format(self._module + '.diag'), + self._print(expr.arg)) + return '{}({}, (-1, 1))'.format( + self._module_format(self._module + '.reshape'), vect) + + def _print_DiagMatrix(self, expr): + return '{}({})'.format(self._module_format(self._module + '.diagflat'), + self._print(expr.args[0])) + + def _print_DiagonalMatrix(self, expr): + return '{}({}, {}({}, {}))'.format(self._module_format(self._module + '.multiply'), + self._print(expr.arg), self._module_format(self._module + '.eye'), + self._print(expr.shape[0]), self._print(expr.shape[1])) + + def _print_Piecewise(self, expr): + "Piecewise function printer" + from sympy.logic.boolalg import ITE, simplify_logic + def print_cond(cond): + """ Problem having an ITE in the cond. """ + if cond.has(ITE): + return self._print(simplify_logic(cond)) + else: + return self._print(cond) + exprs = '[{}]'.format(','.join(self._print(arg.expr) for arg in expr.args)) + conds = '[{}]'.format(','.join(print_cond(arg.cond) for arg in expr.args)) + # If [default_value, True] is a (expr, cond) sequence in a Piecewise object + # it will behave the same as passing the 'default' kwarg to select() + # *as long as* it is the last element in expr.args. + # If this is not the case, it may be triggered prematurely. + return '{}({}, {}, default={})'.format( + self._module_format(self._module + '.select'), conds, exprs, + self._print(S.NaN)) + + def _print_Relational(self, expr): + "Relational printer for Equality and Unequality" + op = { + '==' :'equal', + '!=' :'not_equal', + '<' :'less', + '<=' :'less_equal', + '>' :'greater', + '>=' :'greater_equal', + } + if expr.rel_op in op: + lhs = self._print(expr.lhs) + rhs = self._print(expr.rhs) + return '{op}({lhs}, {rhs})'.format(op=self._module_format(self._module + '.'+op[expr.rel_op]), + lhs=lhs, rhs=rhs) + return super()._print_Relational(expr) + + def _print_And(self, expr): + "Logical And printer" + # We have to override LambdaPrinter because it uses Python 'and' keyword. + # If LambdaPrinter didn't define it, we could use StrPrinter's + # version of the function and add 'logical_and' to NUMPY_TRANSLATIONS. + return '{}.reduce(({}))'.format(self._module_format(self._module + '.logical_and'), ','.join(self._print(i) for i in expr.args)) + + def _print_Or(self, expr): + "Logical Or printer" + # We have to override LambdaPrinter because it uses Python 'or' keyword. + # If LambdaPrinter didn't define it, we could use StrPrinter's + # version of the function and add 'logical_or' to NUMPY_TRANSLATIONS. + return '{}.reduce(({}))'.format(self._module_format(self._module + '.logical_or'), ','.join(self._print(i) for i in expr.args)) + + def _print_Not(self, expr): + "Logical Not printer" + # We have to override LambdaPrinter because it uses Python 'not' keyword. + # If LambdaPrinter didn't define it, we would still have to define our + # own because StrPrinter doesn't define it. + return '{}({})'.format(self._module_format(self._module + '.logical_not'), ','.join(self._print(i) for i in expr.args)) + + def _print_Pow(self, expr, rational=False): + # XXX Workaround for negative integer power error + if expr.exp.is_integer and expr.exp.is_negative: + expr = Pow(expr.base, expr.exp.evalf(), evaluate=False) + return self._hprint_Pow(expr, rational=rational, sqrt=self._module + '.sqrt') + + def _helper_minimum_maximum(self, op: str, *args): + if len(args) == 0: + raise NotImplementedError(f"Need at least one argument for {op}") + elif len(args) == 1: + return self._print(args[0]) + _reduce = self._module_format('functools.reduce') + s_args = [self._print(arg) for arg in args] + return f"{_reduce}({op}, [{', '.join(s_args)}])" + + def _print_Min(self, expr): + return self._print_minimum(expr) + + def _print_amin(self, expr): + return '{}({}, axis={})'.format(self._module_format(self._module + '.amin'), self._print(expr.array), self._print(expr.axis)) + + def _print_minimum(self, expr): + op = self._module_format(self._module + '.minimum') + return self._helper_minimum_maximum(op, *expr.args) + + def _print_Max(self, expr): + return self._print_maximum(expr) + + def _print_amax(self, expr): + return '{}({}, axis={})'.format(self._module_format(self._module + '.amax'), self._print(expr.array), self._print(expr.axis)) + + def _print_maximum(self, expr): + op = self._module_format(self._module + '.maximum') + return self._helper_minimum_maximum(op, *expr.args) + + def _print_arg(self, expr): + return "%s(%s)" % (self._module_format(self._module + '.angle'), self._print(expr.args[0])) + + def _print_im(self, expr): + return "%s(%s)" % (self._module_format(self._module + '.imag'), self._print(expr.args[0])) + + def _print_Mod(self, expr): + return "%s(%s)" % (self._module_format(self._module + '.mod'), ', '.join( + (self._print(arg) for arg in expr.args))) + + def _print_re(self, expr): + return "%s(%s)" % (self._module_format(self._module + '.real'), self._print(expr.args[0])) + + def _print_sinc(self, expr): + return "%s(%s)" % (self._module_format(self._module + '.sinc'), self._print(expr.args[0]/S.Pi)) + + def _print_MatrixBase(self, expr): + if 0 in expr.shape: + func = self._module_format(f'{self._module}.{self._zeros}') + return f"{func}({self._print(expr.shape)})" + func = self.known_functions.get(expr.__class__.__name__, None) + if func is None: + func = self._module_format(f'{self._module}.array') + return "%s(%s)" % (func, self._print(expr.tolist())) + + def _print_Identity(self, expr): + shape = expr.shape + if all(dim.is_Integer for dim in shape): + return "%s(%s)" % (self._module_format(self._module + '.eye'), self._print(expr.shape[0])) + else: + raise NotImplementedError("Symbolic matrix dimensions are not yet supported for identity matrices") + + def _print_BlockMatrix(self, expr): + return '{}({})'.format(self._module_format(self._module + '.block'), + self._print(expr.args[0].tolist())) + + def _print_NDimArray(self, expr): + if expr.rank() == 0: + func = self._module_format(f'{self._module}.array') + return f"{func}({self._print(expr[()])})" + if 0 in expr.shape: + func = self._module_format(f'{self._module}.{self._zeros}') + return f"{func}({self._print(expr.shape)})" + func = self._module_format(f'{self._module}.array') + return f"{func}({self._print(expr.tolist())})" + + _add = "add" + _einsum = "einsum" + _transpose = "transpose" + _ones = "ones" + _zeros = "zeros" + + _print_lowergamma = CodePrinter._print_not_supported + _print_uppergamma = CodePrinter._print_not_supported + _print_fresnelc = CodePrinter._print_not_supported + _print_fresnels = CodePrinter._print_not_supported + +for func in _numpy_known_functions: + setattr(NumPyPrinter, f'_print_{func}', _print_known_func) + +for const in _numpy_known_constants: + setattr(NumPyPrinter, f'_print_{const}', _print_known_const) + + +_known_functions_scipy_special = { + 'Ei': 'expi', + 'erf': 'erf', + 'erfc': 'erfc', + 'besselj': 'jv', + 'bessely': 'yv', + 'besseli': 'iv', + 'besselk': 'kv', + 'cosm1': 'cosm1', + 'powm1': 'powm1', + 'factorial': 'factorial', + 'gamma': 'gamma', + 'loggamma': 'gammaln', + 'digamma': 'psi', + 'polygamma': 'polygamma', + 'RisingFactorial': 'poch', + 'jacobi': 'eval_jacobi', + 'gegenbauer': 'eval_gegenbauer', + 'chebyshevt': 'eval_chebyt', + 'chebyshevu': 'eval_chebyu', + 'legendre': 'eval_legendre', + 'hermite': 'eval_hermite', + 'laguerre': 'eval_laguerre', + 'assoc_laguerre': 'eval_genlaguerre', + 'beta': 'beta', + 'LambertW' : 'lambertw', +} + +_known_constants_scipy_constants = { + 'GoldenRatio': 'golden_ratio', + 'Pi': 'pi', +} +_scipy_known_functions = {k : "scipy.special." + v for k, v in _known_functions_scipy_special.items()} +_scipy_known_constants = {k : "scipy.constants." + v for k, v in _known_constants_scipy_constants.items()} + +class SciPyPrinter(NumPyPrinter): + + _kf = {**NumPyPrinter._kf, **_scipy_known_functions} + _kc = {**NumPyPrinter._kc, **_scipy_known_constants} + + def __init__(self, settings=None): + super().__init__(settings=settings) + self.language = "Python with SciPy and NumPy" + + def _print_SparseRepMatrix(self, expr): + i, j, data = [], [], [] + for (r, c), v in expr.todok().items(): + i.append(r) + j.append(c) + data.append(v) + + return "{name}(({data}, ({i}, {j})), shape={shape})".format( + name=self._module_format('scipy.sparse.coo_matrix'), + data=data, i=i, j=j, shape=expr.shape + ) + + _print_ImmutableSparseMatrix = _print_SparseRepMatrix + + # SciPy's lpmv has a different order of arguments from assoc_legendre + def _print_assoc_legendre(self, expr): + return "{0}({2}, {1}, {3})".format( + self._module_format('scipy.special.lpmv'), + self._print(expr.args[0]), + self._print(expr.args[1]), + self._print(expr.args[2])) + + def _print_lowergamma(self, expr): + return "{0}({2})*{1}({2}, {3})".format( + self._module_format('scipy.special.gamma'), + self._module_format('scipy.special.gammainc'), + self._print(expr.args[0]), + self._print(expr.args[1])) + + def _print_uppergamma(self, expr): + return "{0}({2})*{1}({2}, {3})".format( + self._module_format('scipy.special.gamma'), + self._module_format('scipy.special.gammaincc'), + self._print(expr.args[0]), + self._print(expr.args[1])) + + def _print_betainc(self, expr): + betainc = self._module_format('scipy.special.betainc') + beta = self._module_format('scipy.special.beta') + args = [self._print(arg) for arg in expr.args] + return f"({betainc}({args[0]}, {args[1]}, {args[3]}) - {betainc}({args[0]}, {args[1]}, {args[2]})) \ + * {beta}({args[0]}, {args[1]})" + + def _print_betainc_regularized(self, expr): + return "{0}({1}, {2}, {4}) - {0}({1}, {2}, {3})".format( + self._module_format('scipy.special.betainc'), + self._print(expr.args[0]), + self._print(expr.args[1]), + self._print(expr.args[2]), + self._print(expr.args[3])) + + def _print_fresnels(self, expr): + return "{}({})[0]".format( + self._module_format("scipy.special.fresnel"), + self._print(expr.args[0])) + + def _print_fresnelc(self, expr): + return "{}({})[1]".format( + self._module_format("scipy.special.fresnel"), + self._print(expr.args[0])) + + def _print_airyai(self, expr): + return "{}({})[0]".format( + self._module_format("scipy.special.airy"), + self._print(expr.args[0])) + + def _print_airyaiprime(self, expr): + return "{}({})[1]".format( + self._module_format("scipy.special.airy"), + self._print(expr.args[0])) + + def _print_airybi(self, expr): + return "{}({})[2]".format( + self._module_format("scipy.special.airy"), + self._print(expr.args[0])) + + def _print_airybiprime(self, expr): + return "{}({})[3]".format( + self._module_format("scipy.special.airy"), + self._print(expr.args[0])) + + def _print_bernoulli(self, expr): + # scipy's bernoulli is inconsistent with SymPy's so rewrite + return self._print(expr._eval_rewrite_as_zeta(*expr.args)) + + def _print_harmonic(self, expr): + return self._print(expr._eval_rewrite_as_zeta(*expr.args)) + + def _print_Integral(self, e): + integration_vars, limits = _unpack_integral_limits(e) + + if len(limits) == 1: + # nicer (but not necessary) to prefer quad over nquad for 1D case + module_str = self._module_format("scipy.integrate.quad") + limit_str = "%s, %s" % tuple(map(self._print, limits[0])) + else: + module_str = self._module_format("scipy.integrate.nquad") + limit_str = "({})".format(", ".join( + "(%s, %s)" % tuple(map(self._print, l)) for l in limits)) + + return "{}(lambda {}: {}, {})[0]".format( + module_str, + ", ".join(map(self._print, integration_vars)), + self._print(e.args[0]), + limit_str) + + def _print_Si(self, expr): + return "{}({})[0]".format( + self._module_format("scipy.special.sici"), + self._print(expr.args[0])) + + def _print_Ci(self, expr): + return "{}({})[1]".format( + self._module_format("scipy.special.sici"), + self._print(expr.args[0])) + +for func in _scipy_known_functions: + setattr(SciPyPrinter, f'_print_{func}', _print_known_func) + +for const in _scipy_known_constants: + setattr(SciPyPrinter, f'_print_{const}', _print_known_const) + + +_cupy_known_functions = {k : "cupy." + v for k, v in _known_functions_numpy.items()} +_cupy_known_constants = {k : "cupy." + v for k, v in _known_constants_numpy.items()} + +class CuPyPrinter(NumPyPrinter): + """ + CuPy printer which handles vectorized piecewise functions, + logical operators, etc. + """ + + _module = 'cupy' + _kf = _cupy_known_functions + _kc = _cupy_known_constants + + def __init__(self, settings=None): + super().__init__(settings=settings) + +for func in _cupy_known_functions: + setattr(CuPyPrinter, f'_print_{func}', _print_known_func) + +for const in _cupy_known_constants: + setattr(CuPyPrinter, f'_print_{const}', _print_known_const) + + +_jax_known_functions = {k: 'jax.numpy.' + v for k, v in _known_functions_numpy.items()} +_jax_known_constants = {k: 'jax.numpy.' + v for k, v in _known_constants_numpy.items()} + +class JaxPrinter(NumPyPrinter): + """ + JAX printer which handles vectorized piecewise functions, + logical operators, etc. + """ + _module = "jax.numpy" + + _kf = _jax_known_functions + _kc = _jax_known_constants + + def __init__(self, settings=None): + super().__init__(settings=settings) + self.printmethod = '_jaxcode' + + # These need specific override to allow for the lack of "jax.numpy.reduce" + def _print_And(self, expr): + "Logical And printer" + return "{}({}.asarray([{}]), axis=0)".format( + self._module_format(self._module + ".all"), + self._module_format(self._module), + ",".join(self._print(i) for i in expr.args), + ) + + def _print_Or(self, expr): + "Logical Or printer" + return "{}({}.asarray([{}]), axis=0)".format( + self._module_format(self._module + ".any"), + self._module_format(self._module), + ",".join(self._print(i) for i in expr.args), + ) + +for func in _jax_known_functions: + setattr(JaxPrinter, f'_print_{func}', _print_known_func) + +for const in _jax_known_constants: + setattr(JaxPrinter, f'_print_{const}', _print_known_const) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/octave.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/octave.py new file mode 100644 index 0000000000000000000000000000000000000000..2cf2d6a5754668d7a95ef5dc7b27b4864756a9e5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/octave.py @@ -0,0 +1,711 @@ +""" +Octave (and Matlab) code printer + +The `OctaveCodePrinter` converts SymPy expressions into Octave expressions. +It uses a subset of the Octave language for Matlab compatibility. + +A complete code generator, which uses `octave_code` extensively, can be found +in `sympy.utilities.codegen`. The `codegen` module can be used to generate +complete source code files. + +""" + +from __future__ import annotations +from typing import Any + +from sympy.core import Mul, Pow, S, Rational +from sympy.core.mul import _keep_coeff +from sympy.core.numbers import equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE +from re import search + +# List of known functions. First, those that have the same name in +# SymPy and Octave. This is almost certainly incomplete! +known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc", + "asin", "acos", "acot", "atan", "atan2", "asec", "acsc", + "sinh", "cosh", "tanh", "coth", "csch", "sech", + "asinh", "acosh", "atanh", "acoth", "asech", "acsch", + "erfc", "erfi", "erf", "erfinv", "erfcinv", + "besseli", "besselj", "besselk", "bessely", + "bernoulli", "beta", "euler", "exp", "factorial", "floor", + "fresnelc", "fresnels", "gamma", "harmonic", "log", + "polylog", "sign", "zeta", "legendre"] + +# These functions have different names ("SymPy": "Octave"), more +# generally a mapping to (argument_conditions, octave_function). +known_fcns_src2 = { + "Abs": "abs", + "arg": "angle", # arg/angle ok in Octave but only angle in Matlab + "binomial": "bincoeff", + "ceiling": "ceil", + "chebyshevu": "chebyshevU", + "chebyshevt": "chebyshevT", + "Chi": "coshint", + "Ci": "cosint", + "conjugate": "conj", + "DiracDelta": "dirac", + "Heaviside": "heaviside", + "im": "imag", + "laguerre": "laguerreL", + "LambertW": "lambertw", + "li": "logint", + "loggamma": "gammaln", + "Max": "max", + "Min": "min", + "Mod": "mod", + "polygamma": "psi", + "re": "real", + "RisingFactorial": "pochhammer", + "Shi": "sinhint", + "Si": "sinint", +} + + +class OctaveCodePrinter(CodePrinter): + """ + A printer to convert expressions to strings of Octave/Matlab code. + """ + printmethod = "_octave" + language = "Octave" + + _operators = { + 'and': '&', + 'or': '|', + 'not': '~', + } + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'contract': True, + 'inline': True, + }) + # Note: contract is for expressing tensors as loops (if True), or just + # assignment (if False). FIXME: this should be looked a more carefully + # for Octave. + + + def __init__(self, settings={}): + super().__init__(settings) + self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1)) + self.known_functions.update(dict(known_fcns_src2)) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + + + def _rate_index_position(self, p): + return p*5 + + + def _get_statement(self, codestring): + return "%s;" % codestring + + + def _get_comment(self, text): + return "% {}".format(text) + + + def _declare_number_const(self, name, value): + return "{} = {};".format(name, value) + + + def _format_code(self, lines): + return self.indent_code(lines) + + + def _traverse_matrix_indices(self, mat): + # Octave uses Fortran order (column-major) + rows, cols = mat.shape + return ((i, j) for j in range(cols) for i in range(rows)) + + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + for i in indices: + # Octave arrays start at 1 and end at dimension + var, start, stop = map(self._print, + [i.label, i.lower + 1, i.upper + 1]) + open_lines.append("for %s = %s:%s" % (var, start, stop)) + close_lines.append("end") + return open_lines, close_lines + + + def _print_Mul(self, expr): + # print complex numbers nicely in Octave + if (expr.is_number and expr.is_imaginary and + (S.ImaginaryUnit*expr).is_Integer): + return "%si" % self._print(-S.ImaginaryUnit*expr) + + # cribbed from str.py + prec = precedence(expr) + + c, e = expr.as_coeff_Mul() + if c < 0: + expr = _keep_coeff(-c, e) + sign = "-" + else: + sign = "" + + a = [] # items in the numerator + b = [] # items that are in the denominator (if any) + + pow_paren = [] # Will collect all pow with more than one base element and exp = -1 + + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + # use make_args in case expr was something like -x -> x + args = Mul.make_args(expr) + + # Gather args for numerator/denominator + for item in args: + if (item.is_commutative and item.is_Pow and item.exp.is_Rational + and item.exp.is_negative): + if item.exp != -1: + b.append(Pow(item.base, -item.exp, evaluate=False)) + else: + if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160 + pow_paren.append(item) + b.append(Pow(item.base, -item.exp)) + elif item.is_Rational and item is not S.Infinity: + if item.p != 1: + a.append(Rational(item.p)) + if item.q != 1: + b.append(Rational(item.q)) + else: + a.append(item) + + a = a or [S.One] + + a_str = [self.parenthesize(x, prec) for x in a] + b_str = [self.parenthesize(x, prec) for x in b] + + # To parenthesize Pow with exp = -1 and having more than one Symbol + for item in pow_paren: + if item.base in b: + b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] + + # from here it differs from str.py to deal with "*" and ".*" + def multjoin(a, a_str): + # here we probably are assuming the constants will come first + r = a_str[0] + for i in range(1, len(a)): + mulsym = '*' if a[i-1].is_number else '.*' + r = r + mulsym + a_str[i] + return r + + if not b: + return sign + multjoin(a, a_str) + elif len(b) == 1: + divsym = '/' if b[0].is_number else './' + return sign + multjoin(a, a_str) + divsym + b_str[0] + else: + divsym = '/' if all(bi.is_number for bi in b) else './' + return (sign + multjoin(a, a_str) + + divsym + "(%s)" % multjoin(b, b_str)) + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Pow(self, expr): + powsymbol = '^' if all(x.is_number for x in expr.args) else '.^' + + PREC = precedence(expr) + + if equal_valued(expr.exp, 0.5): + return "sqrt(%s)" % self._print(expr.base) + + if expr.is_commutative: + if equal_valued(expr.exp, -0.5): + sym = '/' if expr.base.is_number else './' + return "1" + sym + "sqrt(%s)" % self._print(expr.base) + if equal_valued(expr.exp, -1): + sym = '/' if expr.base.is_number else './' + return "1" + sym + "%s" % self.parenthesize(expr.base, PREC) + + return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol, + self.parenthesize(expr.exp, PREC)) + + + def _print_MatPow(self, expr): + PREC = precedence(expr) + return '%s^%s' % (self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC)) + + def _print_MatrixSolve(self, expr): + PREC = precedence(expr) + return "%s \\ %s" % (self.parenthesize(expr.matrix, PREC), + self.parenthesize(expr.vector, PREC)) + + def _print_Pi(self, expr): + return 'pi' + + + def _print_ImaginaryUnit(self, expr): + return "1i" + + + def _print_Exp1(self, expr): + return "exp(1)" + + + def _print_GoldenRatio(self, expr): + # FIXME: how to do better, e.g., for octave_code(2*GoldenRatio)? + #return self._print((1+sqrt(S(5)))/2) + return "(1+sqrt(5))/2" + + + def _print_Assignment(self, expr): + from sympy.codegen.ast import Assignment + from sympy.functions.elementary.piecewise import Piecewise + from sympy.tensor.indexed import IndexedBase + # Copied from codeprinter, but remove special MatrixSymbol treatment + lhs = expr.lhs + rhs = expr.rhs + # We special case assignments that take multiple lines + if not self._settings["inline"] and isinstance(expr.rhs, Piecewise): + # Here we modify Piecewise so each expression is now + # an Assignment, and then continue on the print. + expressions = [] + conditions = [] + for (e, c) in rhs.args: + expressions.append(Assignment(lhs, e)) + conditions.append(c) + temp = Piecewise(*zip(expressions, conditions)) + return self._print(temp) + if self._settings["contract"] and (lhs.has(IndexedBase) or + rhs.has(IndexedBase)): + # Here we check if there is looping to be done, and if so + # print the required loops. + return self._doprint_loops(rhs, lhs) + else: + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + return self._get_statement("%s = %s" % (lhs_code, rhs_code)) + + + def _print_Infinity(self, expr): + return 'inf' + + + def _print_NegativeInfinity(self, expr): + return '-inf' + + + def _print_NaN(self, expr): + return 'NaN' + + + def _print_list(self, expr): + return '{' + ', '.join(self._print(a) for a in expr) + '}' + _print_tuple = _print_list + _print_Tuple = _print_list + _print_List = _print_list + + + def _print_BooleanTrue(self, expr): + return "true" + + + def _print_BooleanFalse(self, expr): + return "false" + + + def _print_bool(self, expr): + return str(expr).lower() + + + # Could generate quadrature code for definite Integrals? + #_print_Integral = _print_not_supported + + + def _print_MatrixBase(self, A): + # Handle zero dimensions: + if (A.rows, A.cols) == (0, 0): + return '[]' + elif S.Zero in A.shape: + return 'zeros(%s, %s)' % (A.rows, A.cols) + elif (A.rows, A.cols) == (1, 1): + # Octave does not distinguish between scalars and 1x1 matrices + return self._print(A[0, 0]) + return "[%s]" % "; ".join(" ".join([self._print(a) for a in A[r, :]]) + for r in range(A.rows)) + + + def _print_SparseRepMatrix(self, A): + from sympy.matrices import Matrix + L = A.col_list() + # make row vectors of the indices and entries + I = Matrix([[k[0] + 1 for k in L]]) + J = Matrix([[k[1] + 1 for k in L]]) + AIJ = Matrix([[k[2] for k in L]]) + return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J), + self._print(AIJ), A.rows, A.cols) + + + def _print_MatrixElement(self, expr): + return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + + '(%s, %s)' % (expr.i + 1, expr.j + 1) + + + def _print_MatrixSlice(self, expr): + def strslice(x, lim): + l = x[0] + 1 + h = x[1] + step = x[2] + lstr = self._print(l) + hstr = 'end' if h == lim else self._print(h) + if step == 1: + if l == 1 and h == lim: + return ':' + if l == h: + return lstr + else: + return lstr + ':' + hstr + else: + return ':'.join((lstr, self._print(step), hstr)) + return (self._print(expr.parent) + '(' + + strslice(expr.rowslice, expr.parent.shape[0]) + ', ' + + strslice(expr.colslice, expr.parent.shape[1]) + ')') + + + def _print_Indexed(self, expr): + inds = [ self._print(i) for i in expr.indices ] + return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds)) + + + def _print_KroneckerDelta(self, expr): + prec = PRECEDENCE["Pow"] + return "double(%s == %s)" % tuple(self.parenthesize(x, prec) + for x in expr.args) + + def _print_HadamardProduct(self, expr): + return '.*'.join([self.parenthesize(arg, precedence(expr)) + for arg in expr.args]) + + def _print_HadamardPower(self, expr): + PREC = precedence(expr) + return '.**'.join([ + self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC) + ]) + + def _print_Identity(self, expr): + shape = expr.shape + if len(shape) == 2 and shape[0] == shape[1]: + shape = [shape[0]] + s = ", ".join(self._print(n) for n in shape) + return "eye(" + s + ")" + + def _print_lowergamma(self, expr): + # Octave implements regularized incomplete gamma function + return "(gammainc({1}, {0}).*gamma({0}))".format( + self._print(expr.args[0]), self._print(expr.args[1])) + + + def _print_uppergamma(self, expr): + return "(gammainc({1}, {0}, 'upper').*gamma({0}))".format( + self._print(expr.args[0]), self._print(expr.args[1])) + + + def _print_sinc(self, expr): + #Note: Divide by pi because Octave implements normalized sinc function. + return "sinc(%s)" % self._print(expr.args[0]/S.Pi) + + + def _print_hankel1(self, expr): + return "besselh(%s, 1, %s)" % (self._print(expr.order), + self._print(expr.argument)) + + + def _print_hankel2(self, expr): + return "besselh(%s, 2, %s)" % (self._print(expr.order), + self._print(expr.argument)) + + + # Note: as of 2015, Octave doesn't have spherical Bessel functions + def _print_jn(self, expr): + from sympy.functions import sqrt, besselj + x = expr.argument + expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x) + return self._print(expr2) + + + def _print_yn(self, expr): + from sympy.functions import sqrt, bessely + x = expr.argument + expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x) + return self._print(expr2) + + + def _print_airyai(self, expr): + return "airy(0, %s)" % self._print(expr.args[0]) + + + def _print_airyaiprime(self, expr): + return "airy(1, %s)" % self._print(expr.args[0]) + + + def _print_airybi(self, expr): + return "airy(2, %s)" % self._print(expr.args[0]) + + + def _print_airybiprime(self, expr): + return "airy(3, %s)" % self._print(expr.args[0]) + + + def _print_expint(self, expr): + mu, x = expr.args + if mu != 1: + return self._print_not_supported(expr) + return "expint(%s)" % self._print(x) + + + def _one_or_two_reversed_args(self, expr): + assert len(expr.args) <= 2 + return '{name}({args})'.format( + name=self.known_functions[expr.__class__.__name__], + args=", ".join([self._print(x) for x in reversed(expr.args)]) + ) + + + _print_DiracDelta = _print_LambertW = _one_or_two_reversed_args + + + def _nested_binary_math_func(self, expr): + return '{name}({arg1}, {arg2})'.format( + name=self.known_functions[expr.__class__.__name__], + arg1=self._print(expr.args[0]), + arg2=self._print(expr.func(*expr.args[1:])) + ) + + _print_Max = _print_Min = _nested_binary_math_func + + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + if self._settings["inline"]: + # Express each (cond, expr) pair in a nested Horner form: + # (condition) .* (expr) + (not cond) .* () + # Expressions that result in multiple statements won't work here. + ecpairs = ["({0}).*({1}) + (~({0})).*(".format + (self._print(c), self._print(e)) + for e, c in expr.args[:-1]] + elast = "%s" % self._print(expr.args[-1].expr) + pw = " ...\n".join(ecpairs) + elast + ")"*len(ecpairs) + # Note: current need these outer brackets for 2*pw. Would be + # nicer to teach parenthesize() to do this for us when needed! + return "(" + pw + ")" + else: + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s)" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines.append("else") + else: + lines.append("elseif (%s)" % self._print(c)) + code0 = self._print(e) + lines.append(code0) + if i == len(expr.args) - 1: + lines.append("end") + return "\n".join(lines) + + + def _print_zeta(self, expr): + if len(expr.args) == 1: + return "zeta(%s)" % self._print(expr.args[0]) + else: + # Matlab two argument zeta is not equivalent to SymPy's + return self._print_not_supported(expr) + + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + # code mostly copied from ccode + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ') + dec_regex = ('^end$', '^elseif ', '^else$') + + # pre-strip left-space from the code + code = [ line.lstrip(' \t') for line in code ] + + increase = [ int(any(search(re, line) for re in inc_regex)) + for line in code ] + decrease = [ int(any(search(re, line) for re in dec_regex)) + for line in code ] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + +def octave_code(expr, assign_to=None, **settings): + r"""Converts `expr` to a string of Octave (or Matlab) code. + + The string uses a subset of the Octave language for Matlab compatibility. + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This can be helpful for + expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=16]. + user_functions : dict, optional + A dictionary where keys are ``FunctionClass`` instances and values are + their string representations. Alternatively, the dictionary value can + be a list of tuples i.e. [(argument_test, cfunction_string)]. See + below for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + inline: bool, optional + If True, we try to create single-statement code instead of multiple + statements. [default=True]. + + Examples + ======== + + >>> from sympy import octave_code, symbols, sin, pi + >>> x = symbols('x') + >>> octave_code(sin(x).series(x).removeO()) + 'x.^5/120 - x.^3/6 + x' + + >>> from sympy import Rational, ceiling + >>> x, y, tau = symbols("x, y, tau") + >>> octave_code((2*tau)**Rational(7, 2)) + '8*sqrt(2)*tau.^(7/2)' + + Note that element-wise (Hadamard) operations are used by default between + symbols. This is because its very common in Octave to write "vectorized" + code. It is harmless if the values are scalars. + + >>> octave_code(sin(pi*x*y), assign_to="s") + 's = sin(pi*x.*y);' + + If you need a matrix product "*" or matrix power "^", you can specify the + symbol as a ``MatrixSymbol``. + + >>> from sympy import Symbol, MatrixSymbol + >>> n = Symbol('n', integer=True, positive=True) + >>> A = MatrixSymbol('A', n, n) + >>> octave_code(3*pi*A**3) + '(3*pi)*A^3' + + This class uses several rules to decide which symbol to use a product. + Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*". + A HadamardProduct can be used to specify componentwise multiplication ".*" + of two MatrixSymbols. There is currently there is no easy way to specify + scalar symbols, so sometimes the code might have some minor cosmetic + issues. For example, suppose x and y are scalars and A is a Matrix, then + while a human programmer might write "(x^2*y)*A^3", we generate: + + >>> octave_code(x**2*y*A**3) + '(x.^2.*y)*A^3' + + Matrices are supported using Octave inline notation. When using + ``assign_to`` with matrices, the name can be specified either as a string + or as a ``MatrixSymbol``. The dimensions must align in the latter case. + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([[x**2, sin(x), ceiling(x)]]) + >>> octave_code(mat, assign_to='A') + 'A = [x.^2 sin(x) ceil(x)];' + + ``Piecewise`` expressions are implemented with logical masking by default. + Alternatively, you can pass "inline=False" to use if-else conditionals. + Note that if the ``Piecewise`` lacks a default term, represented by + ``(expr, True)`` then an error will be thrown. This is to prevent + generating an expression that may not evaluate to anything. + + >>> from sympy import Piecewise + >>> pw = Piecewise((x + 1, x > 0), (x, True)) + >>> octave_code(pw, assign_to=tau) + 'tau = ((x > 0).*(x + 1) + (~(x > 0)).*(x));' + + Note that any expression that can be generated normally can also exist + inside a Matrix: + + >>> mat = Matrix([[x**2, pw, sin(x)]]) + >>> octave_code(mat, assign_to='A') + 'A = [x.^2 ((x > 0).*(x + 1) + (~(x > 0)).*(x)) sin(x)];' + + Custom printing can be defined for certain types by passing a dictionary of + "type" : "function" to the ``user_functions`` kwarg. Alternatively, the + dictionary value can be a list of tuples i.e., [(argument_test, + cfunction_string)]. This can be used to call a custom Octave function. + + >>> from sympy import Function + >>> f = Function('f') + >>> g = Function('g') + >>> custom_functions = { + ... "f": "existing_octave_fcn", + ... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"), + ... (lambda x: not x.is_Matrix, "my_fcn")] + ... } + >>> mat = Matrix([[1, x]]) + >>> octave_code(f(x) + g(x) + g(mat), user_functions=custom_functions) + 'existing_octave_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])' + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> octave_code(e.rhs, assign_to=e.lhs, contract=False) + 'Dy(i) = (y(i + 1) - y(i))./(t(i + 1) - t(i));' + """ + return OctaveCodePrinter(settings).doprint(expr, assign_to) + + +def print_octave_code(expr, **settings): + """Prints the Octave (or Matlab) representation of the given expression. + + See `octave_code` for the meaning of the optional arguments. + """ + print(octave_code(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/precedence.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/precedence.py new file mode 100644 index 0000000000000000000000000000000000000000..d22d5746aeee51bddcf273d4575c30c3c27db71a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/precedence.py @@ -0,0 +1,180 @@ +"""A module providing information about the necessity of brackets""" + + +# Default precedence values for some basic types +PRECEDENCE = { + "Lambda": 1, + "Xor": 10, + "Or": 20, + "And": 30, + "Relational": 35, + "Add": 40, + "Mul": 50, + "Pow": 60, + "Func": 70, + "Not": 100, + "Atom": 1000, + "BitwiseOr": 36, + "BitwiseXor": 37, + "BitwiseAnd": 38 +} + +# A dictionary assigning precedence values to certain classes. These values are +# treated like they were inherited, so not every single class has to be named +# here. +# Do not use this with printers other than StrPrinter +PRECEDENCE_VALUES = { + "Equivalent": PRECEDENCE["Xor"], + "Xor": PRECEDENCE["Xor"], + "Implies": PRECEDENCE["Xor"], + "Or": PRECEDENCE["Or"], + "And": PRECEDENCE["And"], + "Add": PRECEDENCE["Add"], + "Pow": PRECEDENCE["Pow"], + "Relational": PRECEDENCE["Relational"], + "Sub": PRECEDENCE["Add"], + "Not": PRECEDENCE["Not"], + "Function" : PRECEDENCE["Func"], + "NegativeInfinity": PRECEDENCE["Add"], + "MatAdd": PRECEDENCE["Add"], + "MatPow": PRECEDENCE["Pow"], + "MatrixSolve": PRECEDENCE["Mul"], + "Mod": PRECEDENCE["Mul"], + "TensAdd": PRECEDENCE["Add"], + # As soon as `TensMul` is a subclass of `Mul`, remove this: + "TensMul": PRECEDENCE["Mul"], + "HadamardProduct": PRECEDENCE["Mul"], + "HadamardPower": PRECEDENCE["Pow"], + "KroneckerProduct": PRECEDENCE["Mul"], + "Equality": PRECEDENCE["Mul"], + "Unequality": PRECEDENCE["Mul"], +} + +# Sometimes it's not enough to assign a fixed precedence value to a +# class. Then a function can be inserted in this dictionary that takes +# an instance of this class as argument and returns the appropriate +# precedence value. + +# Precedence functions + + +def precedence_Mul(item): + from sympy.core.function import Function + if any(hasattr(arg, 'precedence') and isinstance(arg, Function) and + arg.precedence < PRECEDENCE["Mul"] for arg in item.args): + return PRECEDENCE["Mul"] + + if item.could_extract_minus_sign(): + return PRECEDENCE["Add"] + return PRECEDENCE["Mul"] + + +def precedence_Rational(item): + if item.p < 0: + return PRECEDENCE["Add"] + return PRECEDENCE["Mul"] + + +def precedence_Integer(item): + if item.p < 0: + return PRECEDENCE["Add"] + return PRECEDENCE["Atom"] + + +def precedence_Float(item): + if item < 0: + return PRECEDENCE["Add"] + return PRECEDENCE["Atom"] + + +def precedence_PolyElement(item): + if item.is_generator: + return PRECEDENCE["Atom"] + elif item.is_ground: + return precedence(item.coeff(1)) + elif item.is_term: + return PRECEDENCE["Mul"] + else: + return PRECEDENCE["Add"] + + +def precedence_FracElement(item): + if item.denom == 1: + return precedence_PolyElement(item.numer) + else: + return PRECEDENCE["Mul"] + + +def precedence_UnevaluatedExpr(item): + return precedence(item.args[0]) - 0.5 + + +PRECEDENCE_FUNCTIONS = { + "Integer": precedence_Integer, + "Mul": precedence_Mul, + "Rational": precedence_Rational, + "Float": precedence_Float, + "PolyElement": precedence_PolyElement, + "FracElement": precedence_FracElement, + "UnevaluatedExpr": precedence_UnevaluatedExpr, +} + + +def precedence(item): + """Returns the precedence of a given object. + + This is the precedence for StrPrinter. + """ + if hasattr(item, "precedence"): + return item.precedence + if not isinstance(item, type): + for i in type(item).mro(): + n = i.__name__ + if n in PRECEDENCE_FUNCTIONS: + return PRECEDENCE_FUNCTIONS[n](item) + elif n in PRECEDENCE_VALUES: + return PRECEDENCE_VALUES[n] + return PRECEDENCE["Atom"] + + +PRECEDENCE_TRADITIONAL = PRECEDENCE.copy() +PRECEDENCE_TRADITIONAL['Integral'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['Sum'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['Product'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['Limit'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['Derivative'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['TensorProduct'] = PRECEDENCE["Mul"] +PRECEDENCE_TRADITIONAL['Transpose'] = PRECEDENCE["Pow"] +PRECEDENCE_TRADITIONAL['Adjoint'] = PRECEDENCE["Pow"] +PRECEDENCE_TRADITIONAL['Dot'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Cross'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Gradient'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Divergence'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Curl'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Laplacian'] = PRECEDENCE["Mul"] - 1 +PRECEDENCE_TRADITIONAL['Union'] = PRECEDENCE['Xor'] +PRECEDENCE_TRADITIONAL['Intersection'] = PRECEDENCE['Xor'] +PRECEDENCE_TRADITIONAL['Complement'] = PRECEDENCE['Xor'] +PRECEDENCE_TRADITIONAL['SymmetricDifference'] = PRECEDENCE['Xor'] +PRECEDENCE_TRADITIONAL['ProductSet'] = PRECEDENCE['Xor'] +PRECEDENCE_TRADITIONAL['DotProduct'] = PRECEDENCE_TRADITIONAL['Dot'] + + +def precedence_traditional(item): + """Returns the precedence of a given object according to the + traditional rules of mathematics. + + This is the precedence for the LaTeX and pretty printer. + """ + # Integral, Sum, Product, Limit have the precedence of Mul in LaTeX, + # the precedence of Atom for other printers: + from sympy.core.expr import UnevaluatedExpr + + if isinstance(item, UnevaluatedExpr): + return precedence_traditional(item.args[0]) + + n = item.__class__.__name__ + if n in PRECEDENCE_TRADITIONAL: + return PRECEDENCE_TRADITIONAL[n] + + return precedence(item) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..cbabc649152a3c353a37225d342064634fbb5805 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/__init__.py @@ -0,0 +1,12 @@ +"""ASCII-ART 2D pretty-printer""" + +from .pretty import (pretty, pretty_print, pprint, pprint_use_unicode, + pprint_try_use_unicode, pager_print) + +# if unicode output is available -- let's use it +pprint_try_use_unicode() + +__all__ = [ + 'pretty', 'pretty_print', 'pprint', 'pprint_use_unicode', + 'pprint_try_use_unicode', 'pager_print', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..9901ae3697de6c38e6e36be5643c8824ce1b3626 Binary files /dev/null and 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0000000000000000000000000000000000000000..b945f009119b24fc95e8452d91359957baba26a8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/pretty.py @@ -0,0 +1,2937 @@ +import itertools + +from sympy.core import S +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import Number, Rational +from sympy.core.power import Pow +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Symbol +from sympy.core.sympify import SympifyError +from sympy.printing.conventions import requires_partial +from sympy.printing.precedence import PRECEDENCE, precedence, precedence_traditional +from sympy.printing.printer import Printer, print_function +from sympy.printing.str import sstr +from sympy.utilities.iterables import has_variety +from sympy.utilities.exceptions import sympy_deprecation_warning + +from sympy.printing.pretty.stringpict import prettyForm, stringPict +from sympy.printing.pretty.pretty_symbology import hobj, vobj, xobj, \ + xsym, pretty_symbol, pretty_atom, pretty_use_unicode, greek_unicode, U, \ + pretty_try_use_unicode, annotated, is_subscriptable_in_unicode, center_pad, root as nth_root + +# rename for usage from outside +pprint_use_unicode = pretty_use_unicode +pprint_try_use_unicode = pretty_try_use_unicode + + +class PrettyPrinter(Printer): + """Printer, which converts an expression into 2D ASCII-art figure.""" + printmethod = "_pretty" + + _default_settings = { + "order": None, + "full_prec": "auto", + "use_unicode": None, + "wrap_line": True, + "num_columns": None, + "use_unicode_sqrt_char": True, + "root_notation": True, + "mat_symbol_style": "plain", + "imaginary_unit": "i", + "perm_cyclic": True + } + + def __init__(self, settings=None): + Printer.__init__(self, settings) + + if not isinstance(self._settings['imaginary_unit'], str): + raise TypeError("'imaginary_unit' must a string, not {}".format(self._settings['imaginary_unit'])) + elif self._settings['imaginary_unit'] not in ("i", "j"): + raise ValueError("'imaginary_unit' must be either 'i' or 'j', not '{}'".format(self._settings['imaginary_unit'])) + + def emptyPrinter(self, expr): + return prettyForm(str(expr)) + + @property + def _use_unicode(self): + if self._settings['use_unicode']: + return True + else: + return pretty_use_unicode() + + def doprint(self, expr): + return self._print(expr).render(**self._settings) + + # empty op so _print(stringPict) returns the same + def _print_stringPict(self, e): + return e + + def _print_basestring(self, e): + return prettyForm(e) + + def _print_atan2(self, e): + pform = prettyForm(*self._print_seq(e.args).parens()) + pform = prettyForm(*pform.left('atan2')) + return pform + + def _print_Symbol(self, e, bold_name=False): + symb = pretty_symbol(e.name, bold_name) + return prettyForm(symb) + _print_RandomSymbol = _print_Symbol + def _print_MatrixSymbol(self, e): + return self._print_Symbol(e, self._settings['mat_symbol_style'] == "bold") + + def _print_Float(self, e): + # we will use StrPrinter's Float printer, but we need to handle the + # full_prec ourselves, according to the self._print_level + full_prec = self._settings["full_prec"] + if full_prec == "auto": + full_prec = self._print_level == 1 + return prettyForm(sstr(e, full_prec=full_prec)) + + def _print_Cross(self, e): + vec1 = e._expr1 + vec2 = e._expr2 + pform = self._print(vec2) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('MULTIPLICATION SIGN')))) + pform = prettyForm(*pform.left(')')) + pform = prettyForm(*pform.left(self._print(vec1))) + pform = prettyForm(*pform.left('(')) + return pform + + def _print_Curl(self, e): + vec = e._expr + pform = self._print(vec) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('MULTIPLICATION SIGN')))) + pform = prettyForm(*pform.left(self._print(U('NABLA')))) + return pform + + def _print_Divergence(self, e): + vec = e._expr + pform = self._print(vec) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('DOT OPERATOR')))) + pform = prettyForm(*pform.left(self._print(U('NABLA')))) + return pform + + def _print_Dot(self, e): + vec1 = e._expr1 + vec2 = e._expr2 + pform = self._print(vec2) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('DOT OPERATOR')))) + pform = prettyForm(*pform.left(')')) + pform = prettyForm(*pform.left(self._print(vec1))) + pform = prettyForm(*pform.left('(')) + return pform + + def _print_Gradient(self, e): + func = e._expr + pform = self._print(func) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('NABLA')))) + return pform + + def _print_Laplacian(self, e): + func = e._expr + pform = self._print(func) + pform = prettyForm(*pform.left('(')) + pform = prettyForm(*pform.right(')')) + pform = prettyForm(*pform.left(self._print(U('INCREMENT')))) + return pform + + def _print_Atom(self, e): + try: + # print atoms like Exp1 or Pi + return prettyForm(pretty_atom(e.__class__.__name__, printer=self)) + except KeyError: + return self.emptyPrinter(e) + + # Infinity inherits from Number, so we have to override _print_XXX order + _print_Infinity = _print_Atom + _print_NegativeInfinity = _print_Atom + _print_EmptySet = _print_Atom + _print_Naturals = _print_Atom + _print_Naturals0 = _print_Atom + _print_Integers = _print_Atom + _print_Rationals = _print_Atom + _print_Complexes = _print_Atom + + _print_EmptySequence = _print_Atom + + def _print_Reals(self, e): + if self._use_unicode: + return self._print_Atom(e) + else: + inf_list = ['-oo', 'oo'] + return self._print_seq(inf_list, '(', ')') + + def _print_subfactorial(self, e): + x = e.args[0] + pform = self._print(x) + # Add parentheses if needed + if not ((x.is_Integer and x.is_nonnegative) or x.is_Symbol): + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left('!')) + return pform + + def _print_factorial(self, e): + x = e.args[0] + pform = self._print(x) + # Add parentheses if needed + if not ((x.is_Integer and x.is_nonnegative) or x.is_Symbol): + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.right('!')) + return pform + + def _print_factorial2(self, e): + x = e.args[0] + pform = self._print(x) + # Add parentheses if needed + if not ((x.is_Integer and x.is_nonnegative) or x.is_Symbol): + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.right('!!')) + return pform + + def _print_binomial(self, e): + n, k = e.args + + n_pform = self._print(n) + k_pform = self._print(k) + + bar = ' '*max(n_pform.width(), k_pform.width()) + + pform = prettyForm(*k_pform.above(bar)) + pform = prettyForm(*pform.above(n_pform)) + pform = prettyForm(*pform.parens('(', ')')) + + pform.baseline = (pform.baseline + 1)//2 + + return pform + + def _print_Relational(self, e): + op = prettyForm(' ' + xsym(e.rel_op) + ' ') + + l = self._print(e.lhs) + r = self._print(e.rhs) + pform = prettyForm(*stringPict.next(l, op, r), binding=prettyForm.OPEN) + return pform + + def _print_Not(self, e): + from sympy.logic.boolalg import (Equivalent, Implies) + if self._use_unicode: + arg = e.args[0] + pform = self._print(arg) + if isinstance(arg, Equivalent): + return self._print_Equivalent(arg, altchar=pretty_atom('NotEquiv')) + if isinstance(arg, Implies): + return self._print_Implies(arg, altchar=pretty_atom('NotArrow')) + + if arg.is_Boolean and not arg.is_Not: + pform = prettyForm(*pform.parens()) + + return prettyForm(*pform.left(pretty_atom('Not'))) + else: + return self._print_Function(e) + + def __print_Boolean(self, e, char, sort=True): + args = e.args + if sort: + args = sorted(e.args, key=default_sort_key) + arg = args[0] + pform = self._print(arg) + + if arg.is_Boolean and not arg.is_Not: + pform = prettyForm(*pform.parens()) + + for arg in args[1:]: + pform_arg = self._print(arg) + + if arg.is_Boolean and not arg.is_Not: + pform_arg = prettyForm(*pform_arg.parens()) + + pform = prettyForm(*pform.right(' %s ' % char)) + pform = prettyForm(*pform.right(pform_arg)) + + return pform + + def _print_And(self, e): + if self._use_unicode: + return self.__print_Boolean(e, pretty_atom('And')) + else: + return self._print_Function(e, sort=True) + + def _print_Or(self, e): + if self._use_unicode: + return self.__print_Boolean(e, pretty_atom('Or')) + else: + return self._print_Function(e, sort=True) + + def _print_Xor(self, e): + if self._use_unicode: + return self.__print_Boolean(e, pretty_atom("Xor")) + else: + return self._print_Function(e, sort=True) + + def _print_Nand(self, e): + if self._use_unicode: + return self.__print_Boolean(e, pretty_atom('Nand')) + else: + return self._print_Function(e, sort=True) + + def _print_Nor(self, e): + if self._use_unicode: + return self.__print_Boolean(e, pretty_atom('Nor')) + else: + return self._print_Function(e, sort=True) + + def _print_Implies(self, e, altchar=None): + if self._use_unicode: + return self.__print_Boolean(e, altchar or pretty_atom('Arrow'), sort=False) + else: + return self._print_Function(e) + + def _print_Equivalent(self, e, altchar=None): + if self._use_unicode: + return self.__print_Boolean(e, altchar or pretty_atom('Equiv')) + else: + return self._print_Function(e, sort=True) + + def _print_conjugate(self, e): + pform = self._print(e.args[0]) + return prettyForm( *pform.above( hobj('_', pform.width())) ) + + def _print_Abs(self, e): + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens('|', '|')) + return pform + + def _print_floor(self, e): + if self._use_unicode: + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens('lfloor', 'rfloor')) + return pform + else: + return self._print_Function(e) + + def _print_ceiling(self, e): + if self._use_unicode: + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens('lceil', 'rceil')) + return pform + else: + return self._print_Function(e) + + def _print_Derivative(self, deriv): + if requires_partial(deriv.expr) and self._use_unicode: + deriv_symbol = U('PARTIAL DIFFERENTIAL') + else: + deriv_symbol = r'd' + x = None + count_total_deriv = 0 + + for sym, num in reversed(deriv.variable_count): + s = self._print(sym) + ds = prettyForm(*s.left(deriv_symbol)) + count_total_deriv += num + + if (not num.is_Integer) or (num > 1): + ds = ds**prettyForm(str(num)) + + if x is None: + x = ds + else: + x = prettyForm(*x.right(' ')) + x = prettyForm(*x.right(ds)) + + f = prettyForm( + binding=prettyForm.FUNC, *self._print(deriv.expr).parens()) + + pform = prettyForm(deriv_symbol) + + if (count_total_deriv > 1) != False: + pform = pform**prettyForm(str(count_total_deriv)) + + pform = prettyForm(*pform.below(stringPict.LINE, x)) + pform.baseline = pform.baseline + 1 + pform = prettyForm(*stringPict.next(pform, f)) + pform.binding = prettyForm.MUL + + return pform + + def _print_Cycle(self, dc): + from sympy.combinatorics.permutations import Permutation, Cycle + # for Empty Cycle + if dc == Cycle(): + cyc = stringPict('') + return prettyForm(*cyc.parens()) + + dc_list = Permutation(dc.list()).cyclic_form + # for Identity Cycle + if dc_list == []: + cyc = self._print(dc.size - 1) + return prettyForm(*cyc.parens()) + + cyc = stringPict('') + for i in dc_list: + l = self._print(str(tuple(i)).replace(',', '')) + cyc = prettyForm(*cyc.right(l)) + return cyc + + def _print_Permutation(self, expr): + from sympy.combinatorics.permutations import Permutation, Cycle + + perm_cyclic = Permutation.print_cyclic + if perm_cyclic is not None: + sympy_deprecation_warning( + f""" + Setting Permutation.print_cyclic is deprecated. Instead use + init_printing(perm_cyclic={perm_cyclic}). + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-permutation-print_cyclic", + stacklevel=7, + ) + else: + perm_cyclic = self._settings.get("perm_cyclic", True) + + if perm_cyclic: + return self._print_Cycle(Cycle(expr)) + + lower = expr.array_form + upper = list(range(len(lower))) + + result = stringPict('') + first = True + for u, l in zip(upper, lower): + s1 = self._print(u) + s2 = self._print(l) + col = prettyForm(*s1.below(s2)) + if first: + first = False + else: + col = prettyForm(*col.left(" ")) + result = prettyForm(*result.right(col)) + return prettyForm(*result.parens()) + + + def _print_Integral(self, integral): + f = integral.function + + # Add parentheses if arg involves addition of terms and + # create a pretty form for the argument + prettyF = self._print(f) + # XXX generalize parens + if f.is_Add: + prettyF = prettyForm(*prettyF.parens()) + + # dx dy dz ... + arg = prettyF + for x in integral.limits: + prettyArg = self._print(x[0]) + # XXX qparens (parens if needs-parens) + if prettyArg.width() > 1: + prettyArg = prettyForm(*prettyArg.parens()) + + arg = prettyForm(*arg.right(' d', prettyArg)) + + # \int \int \int ... + firstterm = True + s = None + for lim in integral.limits: + # Create bar based on the height of the argument + h = arg.height() + H = h + 2 + + # XXX hack! + ascii_mode = not self._use_unicode + if ascii_mode: + H += 2 + + vint = vobj('int', H) + + # Construct the pretty form with the integral sign and the argument + pform = prettyForm(vint) + pform.baseline = arg.baseline + ( + H - h)//2 # covering the whole argument + + if len(lim) > 1: + # Create pretty forms for endpoints, if definite integral. + # Do not print empty endpoints. + if len(lim) == 2: + prettyA = prettyForm("") + prettyB = self._print(lim[1]) + if len(lim) == 3: + prettyA = self._print(lim[1]) + prettyB = self._print(lim[2]) + + if ascii_mode: # XXX hack + # Add spacing so that endpoint can more easily be + # identified with the correct integral sign + spc = max(1, 3 - prettyB.width()) + prettyB = prettyForm(*prettyB.left(' ' * spc)) + + spc = max(1, 4 - prettyA.width()) + prettyA = prettyForm(*prettyA.right(' ' * spc)) + + pform = prettyForm(*pform.above(prettyB)) + pform = prettyForm(*pform.below(prettyA)) + + if not ascii_mode: # XXX hack + pform = prettyForm(*pform.right(' ')) + + if firstterm: + s = pform # first term + firstterm = False + else: + s = prettyForm(*s.left(pform)) + + pform = prettyForm(*arg.left(s)) + pform.binding = prettyForm.MUL + return pform + + def _print_Product(self, expr): + func = expr.term + pretty_func = self._print(func) + + horizontal_chr = xobj('_', 1) + corner_chr = xobj('_', 1) + vertical_chr = xobj('|', 1) + + if self._use_unicode: + # use unicode corners + horizontal_chr = xobj('-', 1) + corner_chr = xobj('UpTack', 1) + + func_height = pretty_func.height() + + first = True + max_upper = 0 + sign_height = 0 + + for lim in expr.limits: + pretty_lower, pretty_upper = self.__print_SumProduct_Limits(lim) + + width = (func_height + 2) * 5 // 3 - 2 + sign_lines = [horizontal_chr + corner_chr + (horizontal_chr * (width-2)) + corner_chr + horizontal_chr] + for _ in range(func_height + 1): + sign_lines.append(' ' + vertical_chr + (' ' * (width-2)) + vertical_chr + ' ') + + pretty_sign = stringPict('') + pretty_sign = prettyForm(*pretty_sign.stack(*sign_lines)) + + + max_upper = max(max_upper, pretty_upper.height()) + + if first: + sign_height = pretty_sign.height() + + pretty_sign = prettyForm(*pretty_sign.above(pretty_upper)) + pretty_sign = prettyForm(*pretty_sign.below(pretty_lower)) + + if first: + pretty_func.baseline = 0 + first = False + + height = pretty_sign.height() + padding = stringPict('') + padding = prettyForm(*padding.stack(*[' ']*(height - 1))) + pretty_sign = prettyForm(*pretty_sign.right(padding)) + + pretty_func = prettyForm(*pretty_sign.right(pretty_func)) + + pretty_func.baseline = max_upper + sign_height//2 + pretty_func.binding = prettyForm.MUL + return pretty_func + + def __print_SumProduct_Limits(self, lim): + def print_start(lhs, rhs): + op = prettyForm(' ' + xsym("==") + ' ') + l = self._print(lhs) + r = self._print(rhs) + pform = prettyForm(*stringPict.next(l, op, r)) + return pform + + prettyUpper = self._print(lim[2]) + prettyLower = print_start(lim[0], lim[1]) + return prettyLower, prettyUpper + + def _print_Sum(self, expr): + ascii_mode = not self._use_unicode + + def asum(hrequired, lower, upper, use_ascii): + def adjust(s, wid=None, how='<^>'): + if not wid or len(s) > wid: + return s + need = wid - len(s) + if how in ('<^>', "<") or how not in list('<^>'): + return s + ' '*need + half = need//2 + lead = ' '*half + if how == ">": + return " "*need + s + return lead + s + ' '*(need - len(lead)) + + h = max(hrequired, 2) + d = h//2 + w = d + 1 + more = hrequired % 2 + + lines = [] + if use_ascii: + lines.append("_"*(w) + ' ') + lines.append(r"\%s`" % (' '*(w - 1))) + for i in range(1, d): + lines.append('%s\\%s' % (' '*i, ' '*(w - i))) + if more: + lines.append('%s)%s' % (' '*(d), ' '*(w - d))) + for i in reversed(range(1, d)): + lines.append('%s/%s' % (' '*i, ' '*(w - i))) + lines.append("/" + "_"*(w - 1) + ',') + return d, h + more, lines, more + else: + w = w + more + d = d + more + vsum = vobj('sum', 4) + lines.append("_"*(w)) + for i in range(0, d): + lines.append('%s%s%s' % (' '*i, vsum[2], ' '*(w - i - 1))) + for i in reversed(range(0, d)): + lines.append('%s%s%s' % (' '*i, vsum[4], ' '*(w - i - 1))) + lines.append(vsum[8]*(w)) + return d, h + 2*more, lines, more + + f = expr.function + + prettyF = self._print(f) + + if f.is_Add: # add parens + prettyF = prettyForm(*prettyF.parens()) + + H = prettyF.height() + 2 + + # \sum \sum \sum ... + first = True + max_upper = 0 + sign_height = 0 + + for lim in expr.limits: + prettyLower, prettyUpper = self.__print_SumProduct_Limits(lim) + + max_upper = max(max_upper, prettyUpper.height()) + + # Create sum sign based on the height of the argument + d, h, slines, adjustment = asum( + H, prettyLower.width(), prettyUpper.width(), ascii_mode) + prettySign = stringPict('') + prettySign = prettyForm(*prettySign.stack(*slines)) + + if first: + sign_height = prettySign.height() + + prettySign = prettyForm(*prettySign.above(prettyUpper)) + prettySign = prettyForm(*prettySign.below(prettyLower)) + + if first: + # change F baseline so it centers on the sign + prettyF.baseline -= d - (prettyF.height()//2 - + prettyF.baseline) + first = False + + # put padding to the right + pad = stringPict('') + pad = prettyForm(*pad.stack(*[' ']*h)) + prettySign = prettyForm(*prettySign.right(pad)) + # put the present prettyF to the right + prettyF = prettyForm(*prettySign.right(prettyF)) + + # adjust baseline of ascii mode sigma with an odd height so that it is + # exactly through the center + ascii_adjustment = ascii_mode if not adjustment else 0 + prettyF.baseline = max_upper + sign_height//2 + ascii_adjustment + + prettyF.binding = prettyForm.MUL + return prettyF + + def _print_Limit(self, l): + e, z, z0, dir = l.args + + E = self._print(e) + if precedence(e) <= PRECEDENCE["Mul"]: + E = prettyForm(*E.parens('(', ')')) + Lim = prettyForm('lim') + + LimArg = self._print(z) + if self._use_unicode: + LimArg = prettyForm(*LimArg.right(f"{xobj('-', 1)}{pretty_atom('Arrow')}")) + else: + LimArg = prettyForm(*LimArg.right('->')) + LimArg = prettyForm(*LimArg.right(self._print(z0))) + + if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity): + dir = "" + else: + if self._use_unicode: + dir = pretty_atom('SuperscriptPlus') if str(dir) == "+" else pretty_atom('SuperscriptMinus') + + LimArg = prettyForm(*LimArg.right(self._print(dir))) + + Lim = prettyForm(*Lim.below(LimArg)) + Lim = prettyForm(*Lim.right(E), binding=prettyForm.MUL) + + return Lim + + def _print_matrix_contents(self, e): + """ + This method factors out what is essentially grid printing. + """ + M = e # matrix + Ms = {} # i,j -> pretty(M[i,j]) + for i in range(M.rows): + for j in range(M.cols): + Ms[i, j] = self._print(M[i, j]) + + # h- and v- spacers + hsep = 2 + vsep = 1 + + # max width for columns + maxw = [-1] * M.cols + + for j in range(M.cols): + maxw[j] = max([Ms[i, j].width() for i in range(M.rows)] or [0]) + + # drawing result + D = None + + for i in range(M.rows): + + D_row = None + for j in range(M.cols): + s = Ms[i, j] + + # reshape s to maxw + # XXX this should be generalized, and go to stringPict.reshape ? + assert s.width() <= maxw[j] + + # hcenter it, +0.5 to the right 2 + # ( it's better to align formula starts for say 0 and r ) + # XXX this is not good in all cases -- maybe introduce vbaseline? + left, right = center_pad(s.width(), maxw[j]) + + s = prettyForm(*s.right(right)) + s = prettyForm(*s.left(left)) + + # we don't need vcenter cells -- this is automatically done in + # a pretty way because when their baselines are taking into + # account in .right() + + if D_row is None: + D_row = s # first box in a row + continue + + D_row = prettyForm(*D_row.right(' '*hsep)) # h-spacer + D_row = prettyForm(*D_row.right(s)) + + if D is None: + D = D_row # first row in a picture + continue + + # v-spacer + for _ in range(vsep): + D = prettyForm(*D.below(' ')) + + D = prettyForm(*D.below(D_row)) + + if D is None: + D = prettyForm('') # Empty Matrix + + return D + + def _print_MatrixBase(self, e, lparens='[', rparens=']'): + D = self._print_matrix_contents(e) + D.baseline = D.height()//2 + D = prettyForm(*D.parens(lparens, rparens)) + return D + + def _print_Determinant(self, e): + mat = e.arg + if mat.is_MatrixExpr: + from sympy.matrices.expressions.blockmatrix import BlockMatrix + if isinstance(mat, BlockMatrix): + return self._print_MatrixBase(mat.blocks, lparens='|', rparens='|') + D = self._print(mat) + D.baseline = D.height()//2 + return prettyForm(*D.parens('|', '|')) + else: + return self._print_MatrixBase(mat, lparens='|', rparens='|') + + def _print_TensorProduct(self, expr): + # This should somehow share the code with _print_WedgeProduct: + if self._use_unicode: + circled_times = "\u2297" + else: + circled_times = ".*" + return self._print_seq(expr.args, None, None, circled_times, + parenthesize=lambda x: precedence_traditional(x) <= PRECEDENCE["Mul"]) + + def _print_WedgeProduct(self, expr): + # This should somehow share the code with _print_TensorProduct: + if self._use_unicode: + wedge_symbol = "\u2227" + else: + wedge_symbol = '/\\' + return self._print_seq(expr.args, None, None, wedge_symbol, + parenthesize=lambda x: precedence_traditional(x) <= PRECEDENCE["Mul"]) + + def _print_Trace(self, e): + D = self._print(e.arg) + D = prettyForm(*D.parens('(',')')) + D.baseline = D.height()//2 + D = prettyForm(*D.left('\n'*(0) + 'tr')) + return D + + + def _print_MatrixElement(self, expr): + from sympy.matrices import MatrixSymbol + if (isinstance(expr.parent, MatrixSymbol) + and expr.i.is_number and expr.j.is_number): + return self._print( + Symbol(expr.parent.name + '_%d%d' % (expr.i, expr.j))) + else: + prettyFunc = self._print(expr.parent) + prettyFunc = prettyForm(*prettyFunc.parens()) + prettyIndices = self._print_seq((expr.i, expr.j), delimiter=', ' + ).parens(left='[', right=']')[0] + pform = prettyForm(binding=prettyForm.FUNC, + *stringPict.next(prettyFunc, prettyIndices)) + + # store pform parts so it can be reassembled e.g. when powered + pform.prettyFunc = prettyFunc + pform.prettyArgs = prettyIndices + + return pform + + + def _print_MatrixSlice(self, m): + # XXX works only for applied functions + from sympy.matrices import MatrixSymbol + prettyFunc = self._print(m.parent) + if not isinstance(m.parent, MatrixSymbol): + prettyFunc = prettyForm(*prettyFunc.parens()) + def ppslice(x, dim): + x = list(x) + if x[2] == 1: + del x[2] + if x[0] == 0: + x[0] = '' + if x[1] == dim: + x[1] = '' + return prettyForm(*self._print_seq(x, delimiter=':')) + prettyArgs = self._print_seq((ppslice(m.rowslice, m.parent.rows), + ppslice(m.colslice, m.parent.cols)), delimiter=', ').parens(left='[', right=']')[0] + + pform = prettyForm( + binding=prettyForm.FUNC, *stringPict.next(prettyFunc, prettyArgs)) + + # store pform parts so it can be reassembled e.g. when powered + pform.prettyFunc = prettyFunc + pform.prettyArgs = prettyArgs + + return pform + + def _print_Transpose(self, expr): + mat = expr.arg + pform = self._print(mat) + from sympy.matrices import MatrixSymbol, BlockMatrix + if (not isinstance(mat, MatrixSymbol) and + not isinstance(mat, BlockMatrix) and mat.is_MatrixExpr): + pform = prettyForm(*pform.parens()) + pform = pform**(prettyForm('T')) + return pform + + def _print_Adjoint(self, expr): + mat = expr.arg + pform = self._print(mat) + if self._use_unicode: + dag = prettyForm(pretty_atom('Dagger')) + else: + dag = prettyForm('+') + from sympy.matrices import MatrixSymbol, BlockMatrix + if (not isinstance(mat, MatrixSymbol) and + not isinstance(mat, BlockMatrix) and mat.is_MatrixExpr): + pform = prettyForm(*pform.parens()) + pform = pform**dag + return pform + + def _print_BlockMatrix(self, B): + if B.blocks.shape == (1, 1): + return self._print(B.blocks[0, 0]) + return self._print(B.blocks) + + def _print_MatAdd(self, expr): + s = None + for item in expr.args: + pform = self._print(item) + if s is None: + s = pform # First element + else: + coeff = item.as_coeff_mmul()[0] + if S(coeff).could_extract_minus_sign(): + s = prettyForm(*stringPict.next(s, ' ')) + pform = self._print(item) + else: + s = prettyForm(*stringPict.next(s, ' + ')) + s = prettyForm(*stringPict.next(s, pform)) + + return s + + def _print_MatMul(self, expr): + args = list(expr.args) + from sympy.matrices.expressions.hadamard import HadamardProduct + from sympy.matrices.expressions.kronecker import KroneckerProduct + from sympy.matrices.expressions.matadd import MatAdd + for i, a in enumerate(args): + if (isinstance(a, (Add, MatAdd, HadamardProduct, KroneckerProduct)) + and len(expr.args) > 1): + args[i] = prettyForm(*self._print(a).parens()) + else: + args[i] = self._print(a) + + return prettyForm.__mul__(*args) + + def _print_Identity(self, expr): + if self._use_unicode: + return prettyForm(pretty_atom('IdentityMatrix')) + else: + return prettyForm('I') + + def _print_ZeroMatrix(self, expr): + if self._use_unicode: + return prettyForm(pretty_atom('ZeroMatrix')) + else: + return prettyForm('0') + + def _print_OneMatrix(self, expr): + if self._use_unicode: + return prettyForm(pretty_atom("OneMatrix")) + else: + return prettyForm('1') + + def _print_DotProduct(self, expr): + args = list(expr.args) + + for i, a in enumerate(args): + args[i] = self._print(a) + return prettyForm.__mul__(*args) + + def _print_MatPow(self, expr): + pform = self._print(expr.base) + from sympy.matrices import MatrixSymbol + if not isinstance(expr.base, MatrixSymbol) and expr.base.is_MatrixExpr: + pform = prettyForm(*pform.parens()) + pform = pform**(self._print(expr.exp)) + return pform + + def _print_HadamardProduct(self, expr): + from sympy.matrices.expressions.hadamard import HadamardProduct + from sympy.matrices.expressions.matadd import MatAdd + from sympy.matrices.expressions.matmul import MatMul + if self._use_unicode: + delim = pretty_atom('Ring') + else: + delim = '.*' + return self._print_seq(expr.args, None, None, delim, + parenthesize=lambda x: isinstance(x, (MatAdd, MatMul, HadamardProduct))) + + def _print_HadamardPower(self, expr): + # from sympy import MatAdd, MatMul + if self._use_unicode: + circ = pretty_atom('Ring') + else: + circ = self._print('.') + pretty_base = self._print(expr.base) + pretty_exp = self._print(expr.exp) + if precedence(expr.exp) < PRECEDENCE["Mul"]: + pretty_exp = prettyForm(*pretty_exp.parens()) + pretty_circ_exp = prettyForm( + binding=prettyForm.LINE, + *stringPict.next(circ, pretty_exp) + ) + return pretty_base**pretty_circ_exp + + def _print_KroneckerProduct(self, expr): + from sympy.matrices.expressions.matadd import MatAdd + from sympy.matrices.expressions.matmul import MatMul + if self._use_unicode: + delim = f" {pretty_atom('TensorProduct')} " + else: + delim = ' x ' + return self._print_seq(expr.args, None, None, delim, + parenthesize=lambda x: isinstance(x, (MatAdd, MatMul))) + + def _print_FunctionMatrix(self, X): + D = self._print(X.lamda.expr) + D = prettyForm(*D.parens('[', ']')) + return D + + def _print_TransferFunction(self, expr): + if not expr.num == 1: + num, den = expr.num, expr.den + res = Mul(num, Pow(den, -1, evaluate=False), evaluate=False) + return self._print_Mul(res) + else: + return self._print(1)/self._print(expr.den) + + def _print_Series(self, expr): + args = list(expr.args) + for i, a in enumerate(expr.args): + args[i] = prettyForm(*self._print(a).parens()) + return prettyForm.__mul__(*args) + + def _print_MIMOSeries(self, expr): + from sympy.physics.control.lti import MIMOParallel + args = list(expr.args) + pretty_args = [] + for a in reversed(args): + if (isinstance(a, MIMOParallel) and len(expr.args) > 1): + expression = self._print(a) + expression.baseline = expression.height()//2 + pretty_args.append(prettyForm(*expression.parens())) + else: + expression = self._print(a) + expression.baseline = expression.height()//2 + pretty_args.append(expression) + return prettyForm.__mul__(*pretty_args) + + def _print_Parallel(self, expr): + s = None + for item in expr.args: + pform = self._print(item) + if s is None: + s = pform # First element + else: + s = prettyForm(*stringPict.next(s)) + s.baseline = s.height()//2 + s = prettyForm(*stringPict.next(s, ' + ')) + s = prettyForm(*stringPict.next(s, pform)) + return s + + def _print_MIMOParallel(self, expr): + from sympy.physics.control.lti import TransferFunctionMatrix + s = None + for item in expr.args: + pform = self._print(item) + if s is None: + s = pform # First element + else: + s = prettyForm(*stringPict.next(s)) + s.baseline = s.height()//2 + s = prettyForm(*stringPict.next(s, ' + ')) + if isinstance(item, TransferFunctionMatrix): + s.baseline = s.height() - 1 + s = prettyForm(*stringPict.next(s, pform)) + # s.baseline = s.height()//2 + return s + + def _print_Feedback(self, expr): + from sympy.physics.control import TransferFunction, Series + + num, tf = expr.sys1, TransferFunction(1, 1, expr.var) + num_arg_list = list(num.args) if isinstance(num, Series) else [num] + den_arg_list = list(expr.sys2.args) if \ + isinstance(expr.sys2, Series) else [expr.sys2] + + if isinstance(num, Series) and isinstance(expr.sys2, Series): + den = Series(*num_arg_list, *den_arg_list) + elif isinstance(num, Series) and isinstance(expr.sys2, TransferFunction): + if expr.sys2 == tf: + den = Series(*num_arg_list) + else: + den = Series(*num_arg_list, expr.sys2) + elif isinstance(num, TransferFunction) and isinstance(expr.sys2, Series): + if num == tf: + den = Series(*den_arg_list) + else: + den = Series(num, *den_arg_list) + else: + if num == tf: + den = Series(*den_arg_list) + elif expr.sys2 == tf: + den = Series(*num_arg_list) + else: + den = Series(*num_arg_list, *den_arg_list) + + denom = prettyForm(*stringPict.next(self._print(tf))) + denom.baseline = denom.height()//2 + denom = prettyForm(*stringPict.next(denom, ' + ')) if expr.sign == -1 \ + else prettyForm(*stringPict.next(denom, ' - ')) + denom = prettyForm(*stringPict.next(denom, self._print(den))) + + return self._print(num)/denom + + def _print_MIMOFeedback(self, expr): + from sympy.physics.control import MIMOSeries, TransferFunctionMatrix + + inv_mat = self._print(MIMOSeries(expr.sys2, expr.sys1)) + plant = self._print(expr.sys1) + _feedback = prettyForm(*stringPict.next(inv_mat)) + _feedback = prettyForm(*stringPict.right("I + ", _feedback)) if expr.sign == -1 \ + else prettyForm(*stringPict.right("I - ", _feedback)) + _feedback = prettyForm(*stringPict.parens(_feedback)) + _feedback.baseline = 0 + _feedback = prettyForm(*stringPict.right(_feedback, '-1 ')) + _feedback.baseline = _feedback.height()//2 + _feedback = prettyForm.__mul__(_feedback, prettyForm(" ")) + if isinstance(expr.sys1, TransferFunctionMatrix): + _feedback.baseline = _feedback.height() - 1 + _feedback = prettyForm(*stringPict.next(_feedback, plant)) + return _feedback + + def _print_TransferFunctionMatrix(self, expr): + mat = self._print(expr._expr_mat) + mat.baseline = mat.height() - 1 + subscript = greek_unicode['tau'] if self._use_unicode else r'{t}' + mat = prettyForm(*mat.right(subscript)) + return mat + + def _print_StateSpace(self, expr): + from sympy.matrices.expressions.blockmatrix import BlockMatrix + A = expr._A + B = expr._B + C = expr._C + D = expr._D + mat = BlockMatrix([[A, B], [C, D]]) + return self._print(mat.blocks) + + def _print_BasisDependent(self, expr): + from sympy.vector import Vector + + if not self._use_unicode: + raise NotImplementedError("ASCII pretty printing of BasisDependent is not implemented") + + if expr == expr.zero: + return prettyForm(expr.zero._pretty_form) + o1 = [] + vectstrs = [] + if isinstance(expr, Vector): + items = expr.separate().items() + else: + items = [(0, expr)] + for system, vect in items: + inneritems = list(vect.components.items()) + inneritems.sort(key = lambda x: x[0].__str__()) + for k, v in inneritems: + #if the coef of the basis vector is 1 + #we skip the 1 + if v == 1: + o1.append("" + + k._pretty_form) + #Same for -1 + elif v == -1: + o1.append("(-1) " + + k._pretty_form) + #For a general expr + else: + #We always wrap the measure numbers in + #parentheses + arg_str = self._print( + v).parens()[0] + + o1.append(arg_str + ' ' + k._pretty_form) + vectstrs.append(k._pretty_form) + + #outstr = u("").join(o1) + if o1[0].startswith(" + "): + o1[0] = o1[0][3:] + elif o1[0].startswith(" "): + o1[0] = o1[0][1:] + #Fixing the newlines + lengths = [] + strs = [''] + flag = [] + for i, partstr in enumerate(o1): + flag.append(0) + # XXX: What is this hack? + if '\n' in partstr: + tempstr = partstr + tempstr = tempstr.replace(vectstrs[i], '') + if xobj(')_ext', 1) in tempstr: # If scalar is a fraction + for paren in range(len(tempstr)): + flag[i] = 1 + if tempstr[paren] == xobj(')_ext', 1) and tempstr[paren + 1] == '\n': + # We want to place the vector string after all the right parentheses, because + # otherwise, the vector will be in the middle of the string + tempstr = tempstr[:paren] + xobj(')_ext', 1)\ + + ' ' + vectstrs[i] + tempstr[paren + 1:] + break + elif xobj(')_lower_hook', 1) in tempstr: + # We want to place the vector string after all the right parentheses, because + # otherwise, the vector will be in the middle of the string. For this reason, + # we insert the vector string at the rightmost index. + index = tempstr.rfind(xobj(')_lower_hook', 1)) + if index != -1: # then this character was found in this string + flag[i] = 1 + tempstr = tempstr[:index] + xobj(')_lower_hook', 1)\ + + ' ' + vectstrs[i] + tempstr[index + 1:] + o1[i] = tempstr + + o1 = [x.split('\n') for x in o1] + n_newlines = max(len(x) for x in o1) # Width of part in its pretty form + + if 1 in flag: # If there was a fractional scalar + for i, parts in enumerate(o1): + if len(parts) == 1: # If part has no newline + parts.insert(0, ' ' * (len(parts[0]))) + flag[i] = 1 + + for i, parts in enumerate(o1): + lengths.append(len(parts[flag[i]])) + for j in range(n_newlines): + if j+1 <= len(parts): + if j >= len(strs): + strs.append(' ' * (sum(lengths[:-1]) + + 3*(len(lengths)-1))) + if j == flag[i]: + strs[flag[i]] += parts[flag[i]] + ' + ' + else: + strs[j] += parts[j] + ' '*(lengths[-1] - + len(parts[j])+ + 3) + else: + if j >= len(strs): + strs.append(' ' * (sum(lengths[:-1]) + + 3*(len(lengths)-1))) + strs[j] += ' '*(lengths[-1]+3) + + return prettyForm('\n'.join([s[:-3] for s in strs])) + + def _print_NDimArray(self, expr): + from sympy.matrices.immutable import ImmutableMatrix + + if expr.rank() == 0: + return self._print(expr[()]) + + level_str = [[]] + [[] for i in range(expr.rank())] + shape_ranges = [list(range(i)) for i in expr.shape] + # leave eventual matrix elements unflattened + mat = lambda x: ImmutableMatrix(x, evaluate=False) + for outer_i in itertools.product(*shape_ranges): + level_str[-1].append(expr[outer_i]) + even = True + for back_outer_i in range(expr.rank()-1, -1, -1): + if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]: + break + if even: + level_str[back_outer_i].append(level_str[back_outer_i+1]) + else: + level_str[back_outer_i].append(mat( + level_str[back_outer_i+1])) + if len(level_str[back_outer_i + 1]) == 1: + level_str[back_outer_i][-1] = mat( + [[level_str[back_outer_i][-1]]]) + even = not even + level_str[back_outer_i+1] = [] + + out_expr = level_str[0][0] + if expr.rank() % 2 == 1: + out_expr = mat([out_expr]) + + return self._print(out_expr) + + def _printer_tensor_indices(self, name, indices, index_map={}): + center = stringPict(name) + top = stringPict(" "*center.width()) + bot = stringPict(" "*center.width()) + + last_valence = None + prev_map = None + + for index in indices: + indpic = self._print(index.args[0]) + if ((index in index_map) or prev_map) and last_valence == index.is_up: + if index.is_up: + top = prettyForm(*stringPict.next(top, ",")) + else: + bot = prettyForm(*stringPict.next(bot, ",")) + if index in index_map: + indpic = prettyForm(*stringPict.next(indpic, "=")) + indpic = prettyForm(*stringPict.next(indpic, self._print(index_map[index]))) + prev_map = True + else: + prev_map = False + if index.is_up: + top = stringPict(*top.right(indpic)) + center = stringPict(*center.right(" "*indpic.width())) + bot = stringPict(*bot.right(" "*indpic.width())) + else: + bot = stringPict(*bot.right(indpic)) + center = stringPict(*center.right(" "*indpic.width())) + top = stringPict(*top.right(" "*indpic.width())) + last_valence = index.is_up + + pict = prettyForm(*center.above(top)) + pict = prettyForm(*pict.below(bot)) + return pict + + def _print_Tensor(self, expr): + name = expr.args[0].name + indices = expr.get_indices() + return self._printer_tensor_indices(name, indices) + + def _print_TensorElement(self, expr): + name = expr.expr.args[0].name + indices = expr.expr.get_indices() + index_map = expr.index_map + return self._printer_tensor_indices(name, indices, index_map) + + def _print_TensMul(self, expr): + sign, args = expr._get_args_for_traditional_printer() + args = [ + prettyForm(*self._print(i).parens()) if + precedence_traditional(i) < PRECEDENCE["Mul"] else self._print(i) + for i in args + ] + pform = prettyForm.__mul__(*args) + if sign: + return prettyForm(*pform.left(sign)) + else: + return pform + + def _print_TensAdd(self, expr): + args = [ + prettyForm(*self._print(i).parens()) if + precedence_traditional(i) < PRECEDENCE["Mul"] else self._print(i) + for i in expr.args + ] + return prettyForm.__add__(*args) + + def _print_TensorIndex(self, expr): + sym = expr.args[0] + if not expr.is_up: + sym = -sym + return self._print(sym) + + def _print_PartialDerivative(self, deriv): + if self._use_unicode: + deriv_symbol = U('PARTIAL DIFFERENTIAL') + else: + deriv_symbol = r'd' + x = None + + for variable in reversed(deriv.variables): + s = self._print(variable) + ds = prettyForm(*s.left(deriv_symbol)) + + if x is None: + x = ds + else: + x = prettyForm(*x.right(' ')) + x = prettyForm(*x.right(ds)) + + f = prettyForm( + binding=prettyForm.FUNC, *self._print(deriv.expr).parens()) + + pform = prettyForm(deriv_symbol) + + if len(deriv.variables) > 1: + pform = pform**self._print(len(deriv.variables)) + + pform = prettyForm(*pform.below(stringPict.LINE, x)) + pform.baseline = pform.baseline + 1 + pform = prettyForm(*stringPict.next(pform, f)) + pform.binding = prettyForm.MUL + + return pform + + def _print_Piecewise(self, pexpr): + + P = {} + for n, ec in enumerate(pexpr.args): + P[n, 0] = self._print(ec.expr) + if ec.cond == True: + P[n, 1] = prettyForm('otherwise') + else: + P[n, 1] = prettyForm( + *prettyForm('for ').right(self._print(ec.cond))) + hsep = 2 + vsep = 1 + len_args = len(pexpr.args) + + # max widths + maxw = [max(P[i, j].width() for i in range(len_args)) + for j in range(2)] + + # FIXME: Refactor this code and matrix into some tabular environment. + # drawing result + D = None + + for i in range(len_args): + D_row = None + for j in range(2): + p = P[i, j] + assert p.width() <= maxw[j] + + wdelta = maxw[j] - p.width() + wleft = wdelta // 2 + wright = wdelta - wleft + + p = prettyForm(*p.right(' '*wright)) + p = prettyForm(*p.left(' '*wleft)) + + if D_row is None: + D_row = p + continue + + D_row = prettyForm(*D_row.right(' '*hsep)) # h-spacer + D_row = prettyForm(*D_row.right(p)) + if D is None: + D = D_row # first row in a picture + continue + + # v-spacer + for _ in range(vsep): + D = prettyForm(*D.below(' ')) + + D = prettyForm(*D.below(D_row)) + + D = prettyForm(*D.parens('{', '')) + D.baseline = D.height()//2 + D.binding = prettyForm.OPEN + return D + + def _print_ITE(self, ite): + from sympy.functions.elementary.piecewise import Piecewise + return self._print(ite.rewrite(Piecewise)) + + def _hprint_vec(self, v): + D = None + + for a in v: + p = a + if D is None: + D = p + else: + D = prettyForm(*D.right(', ')) + D = prettyForm(*D.right(p)) + if D is None: + D = stringPict(' ') + + return D + + def _hprint_vseparator(self, p1, p2, left=None, right=None, delimiter='', ifascii_nougly=False): + if ifascii_nougly and not self._use_unicode: + return self._print_seq((p1, '|', p2), left=left, right=right, + delimiter=delimiter, ifascii_nougly=True) + tmp = self._print_seq((p1, p2,), left=left, right=right, delimiter=delimiter) + sep = stringPict(vobj('|', tmp.height()), baseline=tmp.baseline) + return self._print_seq((p1, sep, p2), left=left, right=right, + delimiter=delimiter) + + def _print_hyper(self, e): + # FIXME refactor Matrix, Piecewise, and this into a tabular environment + ap = [self._print(a) for a in e.ap] + bq = [self._print(b) for b in e.bq] + + P = self._print(e.argument) + P.baseline = P.height()//2 + + # Drawing result - first create the ap, bq vectors + D = None + for v in [ap, bq]: + D_row = self._hprint_vec(v) + if D is None: + D = D_row # first row in a picture + else: + D = prettyForm(*D.below(' ')) + D = prettyForm(*D.below(D_row)) + + # make sure that the argument `z' is centred vertically + D.baseline = D.height()//2 + + # insert horizontal separator + P = prettyForm(*P.left(' ')) + D = prettyForm(*D.right(' ')) + + # insert separating `|` + D = self._hprint_vseparator(D, P) + + # add parens + D = prettyForm(*D.parens('(', ')')) + + # create the F symbol + above = D.height()//2 - 1 + below = D.height() - above - 1 + + sz, t, b, add, img = annotated('F') + F = prettyForm('\n' * (above - t) + img + '\n' * (below - b), + baseline=above + sz) + add = (sz + 1)//2 + + F = prettyForm(*F.left(self._print(len(e.ap)))) + F = prettyForm(*F.right(self._print(len(e.bq)))) + F.baseline = above + add + + D = prettyForm(*F.right(' ', D)) + + return D + + def _print_meijerg(self, e): + # FIXME refactor Matrix, Piecewise, and this into a tabular environment + + v = {} + v[(0, 0)] = [self._print(a) for a in e.an] + v[(0, 1)] = [self._print(a) for a in e.aother] + v[(1, 0)] = [self._print(b) for b in e.bm] + v[(1, 1)] = [self._print(b) for b in e.bother] + + P = self._print(e.argument) + P.baseline = P.height()//2 + + vp = {} + for idx in v: + vp[idx] = self._hprint_vec(v[idx]) + + for i in range(2): + maxw = max(vp[(0, i)].width(), vp[(1, i)].width()) + for j in range(2): + s = vp[(j, i)] + left = (maxw - s.width()) // 2 + right = maxw - left - s.width() + s = prettyForm(*s.left(' ' * left)) + s = prettyForm(*s.right(' ' * right)) + vp[(j, i)] = s + + D1 = prettyForm(*vp[(0, 0)].right(' ', vp[(0, 1)])) + D1 = prettyForm(*D1.below(' ')) + D2 = prettyForm(*vp[(1, 0)].right(' ', vp[(1, 1)])) + D = prettyForm(*D1.below(D2)) + + # make sure that the argument `z' is centred vertically + D.baseline = D.height()//2 + + # insert horizontal separator + P = prettyForm(*P.left(' ')) + D = prettyForm(*D.right(' ')) + + # insert separating `|` + D = self._hprint_vseparator(D, P) + + # add parens + D = prettyForm(*D.parens('(', ')')) + + # create the G symbol + above = D.height()//2 - 1 + below = D.height() - above - 1 + + sz, t, b, add, img = annotated('G') + F = prettyForm('\n' * (above - t) + img + '\n' * (below - b), + baseline=above + sz) + + pp = self._print(len(e.ap)) + pq = self._print(len(e.bq)) + pm = self._print(len(e.bm)) + pn = self._print(len(e.an)) + + def adjust(p1, p2): + diff = p1.width() - p2.width() + if diff == 0: + return p1, p2 + elif diff > 0: + return p1, prettyForm(*p2.left(' '*diff)) + else: + return prettyForm(*p1.left(' '*-diff)), p2 + pp, pm = adjust(pp, pm) + pq, pn = adjust(pq, pn) + pu = prettyForm(*pm.right(', ', pn)) + pl = prettyForm(*pp.right(', ', pq)) + + ht = F.baseline - above - 2 + if ht > 0: + pu = prettyForm(*pu.below('\n'*ht)) + p = prettyForm(*pu.below(pl)) + + F.baseline = above + F = prettyForm(*F.right(p)) + + F.baseline = above + add + + D = prettyForm(*F.right(' ', D)) + + return D + + def _print_ExpBase(self, e): + # TODO should exp_polar be printed differently? + # what about exp_polar(0), exp_polar(1)? + base = prettyForm(pretty_atom('Exp1', 'e')) + return base ** self._print(e.args[0]) + + def _print_Exp1(self, e): + return prettyForm(pretty_atom('Exp1', 'e')) + + def _print_Function(self, e, sort=False, func_name=None, left='(', + right=')'): + # optional argument func_name for supplying custom names + # XXX works only for applied functions + return self._helper_print_function(e.func, e.args, sort=sort, func_name=func_name, left=left, right=right) + + def _print_mathieuc(self, e): + return self._print_Function(e, func_name='C') + + def _print_mathieus(self, e): + return self._print_Function(e, func_name='S') + + def _print_mathieucprime(self, e): + return self._print_Function(e, func_name="C'") + + def _print_mathieusprime(self, e): + return self._print_Function(e, func_name="S'") + + def _helper_print_function(self, func, args, sort=False, func_name=None, + delimiter=', ', elementwise=False, left='(', + right=')'): + if sort: + args = sorted(args, key=default_sort_key) + + if not func_name and hasattr(func, "__name__"): + func_name = func.__name__ + + if func_name: + prettyFunc = self._print(Symbol(func_name)) + else: + prettyFunc = prettyForm(*self._print(func).parens()) + + if elementwise: + if self._use_unicode: + circ = pretty_atom('Modifier Letter Low Ring') + else: + circ = '.' + circ = self._print(circ) + prettyFunc = prettyForm( + binding=prettyForm.LINE, + *stringPict.next(prettyFunc, circ) + ) + + prettyArgs = prettyForm(*self._print_seq(args, delimiter=delimiter).parens( + left=left, right=right)) + + pform = prettyForm( + binding=prettyForm.FUNC, *stringPict.next(prettyFunc, prettyArgs)) + + # store pform parts so it can be reassembled e.g. when powered + pform.prettyFunc = prettyFunc + pform.prettyArgs = prettyArgs + + return pform + + def _print_ElementwiseApplyFunction(self, e): + func = e.function + arg = e.expr + args = [arg] + return self._helper_print_function(func, args, delimiter="", elementwise=True) + + @property + def _special_function_classes(self): + from sympy.functions.special.tensor_functions import KroneckerDelta + from sympy.functions.special.gamma_functions import gamma, lowergamma + from sympy.functions.special.zeta_functions import lerchphi + from sympy.functions.special.beta_functions import beta + from sympy.functions.special.delta_functions import DiracDelta + from sympy.functions.special.error_functions import Chi + return {KroneckerDelta: [greek_unicode['delta'], 'delta'], + gamma: [greek_unicode['Gamma'], 'Gamma'], + lerchphi: [greek_unicode['Phi'], 'lerchphi'], + lowergamma: [greek_unicode['gamma'], 'gamma'], + beta: [greek_unicode['Beta'], 'B'], + DiracDelta: [greek_unicode['delta'], 'delta'], + Chi: ['Chi', 'Chi']} + + def _print_FunctionClass(self, expr): + for cls in self._special_function_classes: + if issubclass(expr, cls) and expr.__name__ == cls.__name__: + if self._use_unicode: + return prettyForm(self._special_function_classes[cls][0]) + else: + return prettyForm(self._special_function_classes[cls][1]) + func_name = expr.__name__ + return prettyForm(pretty_symbol(func_name)) + + def _print_GeometryEntity(self, expr): + # GeometryEntity is based on Tuple but should not print like a Tuple + return self.emptyPrinter(expr) + + def _print_polylog(self, e): + subscript = self._print(e.args[0]) + if self._use_unicode and is_subscriptable_in_unicode(subscript): + return self._print_Function(Function('Li_%s' % subscript)(e.args[1])) + return self._print_Function(e) + + def _print_lerchphi(self, e): + func_name = greek_unicode['Phi'] if self._use_unicode else 'lerchphi' + return self._print_Function(e, func_name=func_name) + + def _print_dirichlet_eta(self, e): + func_name = greek_unicode['eta'] if self._use_unicode else 'dirichlet_eta' + return self._print_Function(e, func_name=func_name) + + def _print_Heaviside(self, e): + func_name = greek_unicode['theta'] if self._use_unicode else 'Heaviside' + if e.args[1] is S.Half: + pform = prettyForm(*self._print(e.args[0]).parens()) + pform = prettyForm(*pform.left(func_name)) + return pform + else: + return self._print_Function(e, func_name=func_name) + + def _print_fresnels(self, e): + return self._print_Function(e, func_name="S") + + def _print_fresnelc(self, e): + return self._print_Function(e, func_name="C") + + def _print_airyai(self, e): + return self._print_Function(e, func_name="Ai") + + def _print_airybi(self, e): + return self._print_Function(e, func_name="Bi") + + def _print_airyaiprime(self, e): + return self._print_Function(e, func_name="Ai'") + + def _print_airybiprime(self, e): + return self._print_Function(e, func_name="Bi'") + + def _print_LambertW(self, e): + return self._print_Function(e, func_name="W") + + def _print_Covariance(self, e): + return self._print_Function(e, func_name="Cov") + + def _print_Variance(self, e): + return self._print_Function(e, func_name="Var") + + def _print_Probability(self, e): + return self._print_Function(e, func_name="P") + + def _print_Expectation(self, e): + return self._print_Function(e, func_name="E", left='[', right=']') + + def _print_Lambda(self, e): + expr = e.expr + sig = e.signature + if self._use_unicode: + arrow = f" {pretty_atom('ArrowFromBar')} " + else: + arrow = " -> " + if len(sig) == 1 and sig[0].is_symbol: + sig = sig[0] + var_form = self._print(sig) + + return prettyForm(*stringPict.next(var_form, arrow, self._print(expr)), binding=8) + + def _print_Order(self, expr): + pform = self._print(expr.expr) + if (expr.point and any(p != S.Zero for p in expr.point)) or \ + len(expr.variables) > 1: + pform = prettyForm(*pform.right("; ")) + if len(expr.variables) > 1: + pform = prettyForm(*pform.right(self._print(expr.variables))) + elif len(expr.variables): + pform = prettyForm(*pform.right(self._print(expr.variables[0]))) + if self._use_unicode: + pform = prettyForm(*pform.right(f" {pretty_atom('Arrow')} ")) + else: + pform = prettyForm(*pform.right(" -> ")) + if len(expr.point) > 1: + pform = prettyForm(*pform.right(self._print(expr.point))) + else: + pform = prettyForm(*pform.right(self._print(expr.point[0]))) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left("O")) + return pform + + def _print_SingularityFunction(self, e): + if self._use_unicode: + shift = self._print(e.args[0]-e.args[1]) + n = self._print(e.args[2]) + base = prettyForm("<") + base = prettyForm(*base.right(shift)) + base = prettyForm(*base.right(">")) + pform = base**n + return pform + else: + n = self._print(e.args[2]) + shift = self._print(e.args[0]-e.args[1]) + base = self._print_seq(shift, "<", ">", ' ') + return base**n + + def _print_beta(self, e): + func_name = greek_unicode['Beta'] if self._use_unicode else 'B' + return self._print_Function(e, func_name=func_name) + + def _print_betainc(self, e): + func_name = "B'" + return self._print_Function(e, func_name=func_name) + + def _print_betainc_regularized(self, e): + func_name = 'I' + return self._print_Function(e, func_name=func_name) + + def _print_gamma(self, e): + func_name = greek_unicode['Gamma'] if self._use_unicode else 'Gamma' + return self._print_Function(e, func_name=func_name) + + def _print_uppergamma(self, e): + func_name = greek_unicode['Gamma'] if self._use_unicode else 'Gamma' + return self._print_Function(e, func_name=func_name) + + def _print_lowergamma(self, e): + func_name = greek_unicode['gamma'] if self._use_unicode else 'lowergamma' + return self._print_Function(e, func_name=func_name) + + def _print_DiracDelta(self, e): + if self._use_unicode: + if len(e.args) == 2: + a = prettyForm(greek_unicode['delta']) + b = self._print(e.args[1]) + b = prettyForm(*b.parens()) + c = self._print(e.args[0]) + c = prettyForm(*c.parens()) + pform = a**b + pform = prettyForm(*pform.right(' ')) + pform = prettyForm(*pform.right(c)) + return pform + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left(greek_unicode['delta'])) + return pform + else: + return self._print_Function(e) + + def _print_expint(self, e): + subscript = self._print(e.args[0]) + if self._use_unicode and is_subscriptable_in_unicode(subscript): + return self._print_Function(Function('E_%s' % subscript)(e.args[1])) + return self._print_Function(e) + + def _print_Chi(self, e): + # This needs a special case since otherwise it comes out as greek + # letter chi... + prettyFunc = prettyForm("Chi") + prettyArgs = prettyForm(*self._print_seq(e.args).parens()) + + pform = prettyForm( + binding=prettyForm.FUNC, *stringPict.next(prettyFunc, prettyArgs)) + + # store pform parts so it can be reassembled e.g. when powered + pform.prettyFunc = prettyFunc + pform.prettyArgs = prettyArgs + + return pform + + def _print_elliptic_e(self, e): + pforma0 = self._print(e.args[0]) + if len(e.args) == 1: + pform = pforma0 + else: + pforma1 = self._print(e.args[1]) + pform = self._hprint_vseparator(pforma0, pforma1) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left('E')) + return pform + + def _print_elliptic_k(self, e): + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left('K')) + return pform + + def _print_elliptic_f(self, e): + pforma0 = self._print(e.args[0]) + pforma1 = self._print(e.args[1]) + pform = self._hprint_vseparator(pforma0, pforma1) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left('F')) + return pform + + def _print_elliptic_pi(self, e): + name = greek_unicode['Pi'] if self._use_unicode else 'Pi' + pforma0 = self._print(e.args[0]) + pforma1 = self._print(e.args[1]) + if len(e.args) == 2: + pform = self._hprint_vseparator(pforma0, pforma1) + else: + pforma2 = self._print(e.args[2]) + pforma = self._hprint_vseparator(pforma1, pforma2, ifascii_nougly=False) + pforma = prettyForm(*pforma.left('; ')) + pform = prettyForm(*pforma.left(pforma0)) + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left(name)) + return pform + + def _print_GoldenRatio(self, expr): + if self._use_unicode: + return prettyForm(pretty_symbol('phi')) + return self._print(Symbol("GoldenRatio")) + + def _print_EulerGamma(self, expr): + if self._use_unicode: + return prettyForm(pretty_symbol('gamma')) + return self._print(Symbol("EulerGamma")) + + def _print_Catalan(self, expr): + return self._print(Symbol("G")) + + def _print_Mod(self, expr): + pform = self._print(expr.args[0]) + if pform.binding > prettyForm.MUL: + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.right(' mod ')) + pform = prettyForm(*pform.right(self._print(expr.args[1]))) + pform.binding = prettyForm.OPEN + return pform + + def _print_Add(self, expr, order=None): + terms = self._as_ordered_terms(expr, order=order) + pforms, indices = [], [] + + def pretty_negative(pform, index): + """Prepend a minus sign to a pretty form. """ + #TODO: Move this code to prettyForm + if index == 0: + if pform.height() > 1: + pform_neg = '- ' + else: + pform_neg = '-' + else: + pform_neg = ' - ' + + if (pform.binding > prettyForm.NEG + or pform.binding == prettyForm.ADD): + p = stringPict(*pform.parens()) + else: + p = pform + p = stringPict.next(pform_neg, p) + # Lower the binding to NEG, even if it was higher. Otherwise, it + # will print as a + ( - (b)), instead of a - (b). + return prettyForm(binding=prettyForm.NEG, *p) + + for i, term in enumerate(terms): + if term.is_Mul and term.could_extract_minus_sign(): + coeff, other = term.as_coeff_mul(rational=False) + if coeff == -1: + negterm = Mul(*other, evaluate=False) + else: + negterm = Mul(-coeff, *other, evaluate=False) + pform = self._print(negterm) + pforms.append(pretty_negative(pform, i)) + elif term.is_Rational and term.q > 1: + pforms.append(None) + indices.append(i) + elif term.is_Number and term < 0: + pform = self._print(-term) + pforms.append(pretty_negative(pform, i)) + elif term.is_Relational: + pforms.append(prettyForm(*self._print(term).parens())) + else: + pforms.append(self._print(term)) + + if indices: + large = True + + for pform in pforms: + if pform is not None and pform.height() > 1: + break + else: + large = False + + for i in indices: + term, negative = terms[i], False + + if term < 0: + term, negative = -term, True + + if large: + pform = prettyForm(str(term.p))/prettyForm(str(term.q)) + else: + pform = self._print(term) + + if negative: + pform = pretty_negative(pform, i) + + pforms[i] = pform + + return prettyForm.__add__(*pforms) + + def _print_Mul(self, product): + from sympy.physics.units import Quantity + + # Check for unevaluated Mul. In this case we need to make sure the + # identities are visible, multiple Rational factors are not combined + # etc so we display in a straight-forward form that fully preserves all + # args and their order. + args = product.args + if args[0] is S.One or any(isinstance(arg, Number) for arg in args[1:]): + strargs = list(map(self._print, args)) + # XXX: This is a hack to work around the fact that + # prettyForm.__mul__ absorbs a leading -1 in the args. Probably it + # would be better to fix this in prettyForm.__mul__ instead. + negone = strargs[0] == '-1' + if negone: + strargs[0] = prettyForm('1', 0, 0) + obj = prettyForm.__mul__(*strargs) + if negone: + obj = prettyForm('-' + obj.s, obj.baseline, obj.binding) + return obj + + a = [] # items in the numerator + b = [] # items that are in the denominator (if any) + + if self.order not in ('old', 'none'): + args = product.as_ordered_factors() + else: + args = list(product.args) + + # If quantities are present append them at the back + args = sorted(args, key=lambda x: isinstance(x, Quantity) or + (isinstance(x, Pow) and isinstance(x.base, Quantity))) + + # Gather terms for numerator/denominator + for item in args: + if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative: + if item.exp != -1: + b.append(Pow(item.base, -item.exp, evaluate=False)) + else: + b.append(Pow(item.base, -item.exp)) + elif item.is_Rational and item is not S.Infinity: + if item.p != 1: + a.append( Rational(item.p) ) + if item.q != 1: + b.append( Rational(item.q) ) + else: + a.append(item) + + # Convert to pretty forms. Parentheses are added by `__mul__`. + a = [self._print(ai) for ai in a] + b = [self._print(bi) for bi in b] + + # Construct a pretty form + if len(b) == 0: + return prettyForm.__mul__(*a) + else: + if len(a) == 0: + a.append( self._print(S.One) ) + return prettyForm.__mul__(*a)/prettyForm.__mul__(*b) + + # A helper function for _print_Pow to print x**(1/n) + def _print_nth_root(self, base, root): + bpretty = self._print(base) + + # In very simple cases, use a single-char root sign + if (self._settings['use_unicode_sqrt_char'] and self._use_unicode + and root == 2 and bpretty.height() == 1 + and (bpretty.width() == 1 + or (base.is_Integer and base.is_nonnegative))): + return prettyForm(*bpretty.left(nth_root[2])) + + # Construct root sign, start with the \/ shape + _zZ = xobj('/', 1) + rootsign = xobj('\\', 1) + _zZ + # Constructing the number to put on root + rpretty = self._print(root) + # roots look bad if they are not a single line + if rpretty.height() != 1: + return self._print(base)**self._print(1/root) + # If power is half, no number should appear on top of root sign + exp = '' if root == 2 else str(rpretty).ljust(2) + if len(exp) > 2: + rootsign = ' '*(len(exp) - 2) + rootsign + # Stack the exponent + rootsign = stringPict(exp + '\n' + rootsign) + rootsign.baseline = 0 + # Diagonal: length is one less than height of base + linelength = bpretty.height() - 1 + diagonal = stringPict('\n'.join( + ' '*(linelength - i - 1) + _zZ + ' '*i + for i in range(linelength) + )) + # Put baseline just below lowest line: next to exp + diagonal.baseline = linelength - 1 + # Make the root symbol + rootsign = prettyForm(*rootsign.right(diagonal)) + # Det the baseline to match contents to fix the height + # but if the height of bpretty is one, the rootsign must be one higher + rootsign.baseline = max(1, bpretty.baseline) + #build result + s = prettyForm(hobj('_', 2 + bpretty.width())) + s = prettyForm(*bpretty.above(s)) + s = prettyForm(*s.left(rootsign)) + return s + + def _print_Pow(self, power): + from sympy.simplify.simplify import fraction + b, e = power.as_base_exp() + if power.is_commutative: + if e is S.NegativeOne: + return prettyForm("1")/self._print(b) + n, d = fraction(e) + if n is S.One and d.is_Atom and not e.is_Integer and (e.is_Rational or d.is_Symbol) \ + and self._settings['root_notation']: + return self._print_nth_root(b, d) + if e.is_Rational and e < 0: + return prettyForm("1")/self._print(Pow(b, -e, evaluate=False)) + + if b.is_Relational: + return prettyForm(*self._print(b).parens()).__pow__(self._print(e)) + + return self._print(b)**self._print(e) + + def _print_UnevaluatedExpr(self, expr): + return self._print(expr.args[0]) + + def __print_numer_denom(self, p, q): + if q == 1: + if p < 0: + return prettyForm(str(p), binding=prettyForm.NEG) + else: + return prettyForm(str(p)) + elif abs(p) >= 10 and abs(q) >= 10: + # If more than one digit in numer and denom, print larger fraction + if p < 0: + return prettyForm(str(p), binding=prettyForm.NEG)/prettyForm(str(q)) + # Old printing method: + #pform = prettyForm(str(-p))/prettyForm(str(q)) + #return prettyForm(binding=prettyForm.NEG, *pform.left('- ')) + else: + return prettyForm(str(p))/prettyForm(str(q)) + else: + return None + + def _print_Rational(self, expr): + result = self.__print_numer_denom(expr.p, expr.q) + + if result is not None: + return result + else: + return self.emptyPrinter(expr) + + def _print_Fraction(self, expr): + result = self.__print_numer_denom(expr.numerator, expr.denominator) + + if result is not None: + return result + else: + return self.emptyPrinter(expr) + + def _print_ProductSet(self, p): + if len(p.sets) >= 1 and not has_variety(p.sets): + return self._print(p.sets[0]) ** self._print(len(p.sets)) + else: + prod_char = pretty_atom('Multiplication') if self._use_unicode else 'x' + return self._print_seq(p.sets, None, None, ' %s ' % prod_char, + parenthesize=lambda set: set.is_Union or + set.is_Intersection or set.is_ProductSet) + + def _print_FiniteSet(self, s): + items = sorted(s.args, key=default_sort_key) + return self._print_seq(items, '{', '}', ', ' ) + + def _print_Range(self, s): + + if self._use_unicode: + dots = pretty_atom('Dots') + else: + dots = '...' + + if s.start.is_infinite and s.stop.is_infinite: + if s.step.is_positive: + printset = dots, -1, 0, 1, dots + else: + printset = dots, 1, 0, -1, dots + elif s.start.is_infinite: + printset = dots, s[-1] - s.step, s[-1] + elif s.stop.is_infinite: + it = iter(s) + printset = next(it), next(it), dots + elif len(s) > 4: + it = iter(s) + printset = next(it), next(it), dots, s[-1] + else: + printset = tuple(s) + + return self._print_seq(printset, '{', '}', ', ' ) + + def _print_Interval(self, i): + if i.start == i.end: + return self._print_seq(i.args[:1], '{', '}') + + else: + if i.left_open: + left = '(' + else: + left = '[' + + if i.right_open: + right = ')' + else: + right = ']' + + return self._print_seq(i.args[:2], left, right) + + def _print_AccumulationBounds(self, i): + left = '<' + right = '>' + + return self._print_seq(i.args[:2], left, right) + + def _print_Intersection(self, u): + + delimiter = ' %s ' % pretty_atom('Intersection', 'n') + + return self._print_seq(u.args, None, None, delimiter, + parenthesize=lambda set: set.is_ProductSet or + set.is_Union or set.is_Complement) + + def _print_Union(self, u): + + union_delimiter = ' %s ' % pretty_atom('Union', 'U') + + return self._print_seq(u.args, None, None, union_delimiter, + parenthesize=lambda set: set.is_ProductSet or + set.is_Intersection or set.is_Complement) + + def _print_SymmetricDifference(self, u): + if not self._use_unicode: + raise NotImplementedError("ASCII pretty printing of SymmetricDifference is not implemented") + + sym_delimeter = ' %s ' % pretty_atom('SymmetricDifference') + + return self._print_seq(u.args, None, None, sym_delimeter) + + def _print_Complement(self, u): + + delimiter = r' \ ' + + return self._print_seq(u.args, None, None, delimiter, + parenthesize=lambda set: set.is_ProductSet or set.is_Intersection + or set.is_Union) + + def _print_ImageSet(self, ts): + if self._use_unicode: + inn = pretty_atom("SmallElementOf") + else: + inn = 'in' + fun = ts.lamda + sets = ts.base_sets + signature = fun.signature + expr = self._print(fun.expr) + + # TODO: the stuff to the left of the | and the stuff to the right of + # the | should have independent baselines, that way something like + # ImageSet(Lambda(x, 1/x**2), S.Naturals) prints the "x in N" part + # centered on the right instead of aligned with the fraction bar on + # the left. The same also applies to ConditionSet and ComplexRegion + if len(signature) == 1: + S = self._print_seq((signature[0], inn, sets[0]), + delimiter=' ') + return self._hprint_vseparator(expr, S, + left='{', right='}', + ifascii_nougly=True, delimiter=' ') + else: + pargs = tuple(j for var, setv in zip(signature, sets) for j in + (var, ' ', inn, ' ', setv, ", ")) + S = self._print_seq(pargs[:-1], delimiter='') + return self._hprint_vseparator(expr, S, + left='{', right='}', + ifascii_nougly=True, delimiter=' ') + + def _print_ConditionSet(self, ts): + if self._use_unicode: + inn = pretty_atom('SmallElementOf') + # using _and because and is a keyword and it is bad practice to + # overwrite them + _and = pretty_atom('And') + else: + inn = 'in' + _and = 'and' + + variables = self._print_seq(Tuple(ts.sym)) + as_expr = getattr(ts.condition, 'as_expr', None) + if as_expr is not None: + cond = self._print(ts.condition.as_expr()) + else: + cond = self._print(ts.condition) + if self._use_unicode: + cond = self._print(cond) + cond = prettyForm(*cond.parens()) + + if ts.base_set is S.UniversalSet: + return self._hprint_vseparator(variables, cond, left="{", + right="}", ifascii_nougly=True, + delimiter=' ') + + base = self._print(ts.base_set) + C = self._print_seq((variables, inn, base, _and, cond), + delimiter=' ') + return self._hprint_vseparator(variables, C, left="{", right="}", + ifascii_nougly=True, delimiter=' ') + + def _print_ComplexRegion(self, ts): + if self._use_unicode: + inn = pretty_atom('SmallElementOf') + else: + inn = 'in' + variables = self._print_seq(ts.variables) + expr = self._print(ts.expr) + prodsets = self._print(ts.sets) + + C = self._print_seq((variables, inn, prodsets), + delimiter=' ') + return self._hprint_vseparator(expr, C, left="{", right="}", + ifascii_nougly=True, delimiter=' ') + + def _print_Contains(self, e): + var, set = e.args + if self._use_unicode: + el = f" {pretty_atom('ElementOf')} " + return prettyForm(*stringPict.next(self._print(var), + el, self._print(set)), binding=8) + else: + return prettyForm(sstr(e)) + + def _print_FourierSeries(self, s): + if s.an.formula is S.Zero and s.bn.formula is S.Zero: + return self._print(s.a0) + if self._use_unicode: + dots = pretty_atom('Dots') + else: + dots = '...' + return self._print_Add(s.truncate()) + self._print(dots) + + def _print_FormalPowerSeries(self, s): + return self._print_Add(s.infinite) + + def _print_SetExpr(self, se): + pretty_set = prettyForm(*self._print(se.set).parens()) + pretty_name = self._print(Symbol("SetExpr")) + return prettyForm(*pretty_name.right(pretty_set)) + + def _print_SeqFormula(self, s): + if self._use_unicode: + dots = pretty_atom('Dots') + else: + dots = '...' + + if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0: + raise NotImplementedError("Pretty printing of sequences with symbolic bound not implemented") + + if s.start is S.NegativeInfinity: + stop = s.stop + printset = (dots, s.coeff(stop - 3), s.coeff(stop - 2), + s.coeff(stop - 1), s.coeff(stop)) + elif s.stop is S.Infinity or s.length > 4: + printset = s[:4] + printset.append(dots) + printset = tuple(printset) + else: + printset = tuple(s) + return self._print_list(printset) + + _print_SeqPer = _print_SeqFormula + _print_SeqAdd = _print_SeqFormula + _print_SeqMul = _print_SeqFormula + + def _print_seq(self, seq, left=None, right=None, delimiter=', ', + parenthesize=lambda x: False, ifascii_nougly=True): + + pforms = [] + for item in seq: + pform = self._print(item) + if parenthesize(item): + pform = prettyForm(*pform.parens()) + if pforms: + pforms.append(delimiter) + pforms.append(pform) + + if not pforms: + s = stringPict('') + else: + s = prettyForm(*stringPict.next(*pforms)) + + s = prettyForm(*s.parens(left, right, ifascii_nougly=ifascii_nougly)) + return s + + def join(self, delimiter, args): + pform = None + + for arg in args: + if pform is None: + pform = arg + else: + pform = prettyForm(*pform.right(delimiter)) + pform = prettyForm(*pform.right(arg)) + + if pform is None: + return prettyForm("") + else: + return pform + + def _print_list(self, l): + return self._print_seq(l, '[', ']') + + def _print_tuple(self, t): + if len(t) == 1: + ptuple = prettyForm(*stringPict.next(self._print(t[0]), ',')) + return prettyForm(*ptuple.parens('(', ')', ifascii_nougly=True)) + else: + return self._print_seq(t, '(', ')') + + def _print_Tuple(self, expr): + return self._print_tuple(expr) + + def _print_dict(self, d): + keys = sorted(d.keys(), key=default_sort_key) + items = [] + + for k in keys: + K = self._print(k) + V = self._print(d[k]) + s = prettyForm(*stringPict.next(K, ': ', V)) + + items.append(s) + + return self._print_seq(items, '{', '}') + + def _print_Dict(self, d): + return self._print_dict(d) + + def _print_set(self, s): + if not s: + return prettyForm('set()') + items = sorted(s, key=default_sort_key) + pretty = self._print_seq(items) + pretty = prettyForm(*pretty.parens('{', '}', ifascii_nougly=True)) + return pretty + + def _print_frozenset(self, s): + if not s: + return prettyForm('frozenset()') + items = sorted(s, key=default_sort_key) + pretty = self._print_seq(items) + pretty = prettyForm(*pretty.parens('{', '}', ifascii_nougly=True)) + pretty = prettyForm(*pretty.parens('(', ')', ifascii_nougly=True)) + pretty = prettyForm(*stringPict.next(type(s).__name__, pretty)) + return pretty + + def _print_UniversalSet(self, s): + if self._use_unicode: + return prettyForm(pretty_atom('Universe')) + else: + return prettyForm('UniversalSet') + + def _print_PolyRing(self, ring): + return prettyForm(sstr(ring)) + + def _print_FracField(self, field): + return prettyForm(sstr(field)) + + def _print_FreeGroupElement(self, elm): + return prettyForm(str(elm)) + + def _print_PolyElement(self, poly): + return prettyForm(sstr(poly)) + + def _print_FracElement(self, frac): + return prettyForm(sstr(frac)) + + def _print_AlgebraicNumber(self, expr): + if expr.is_aliased: + return self._print(expr.as_poly().as_expr()) + else: + return self._print(expr.as_expr()) + + def _print_ComplexRootOf(self, expr): + args = [self._print_Add(expr.expr, order='lex'), expr.index] + pform = prettyForm(*self._print_seq(args).parens()) + pform = prettyForm(*pform.left('CRootOf')) + return pform + + def _print_RootSum(self, expr): + args = [self._print_Add(expr.expr, order='lex')] + + if expr.fun is not S.IdentityFunction: + args.append(self._print(expr.fun)) + + pform = prettyForm(*self._print_seq(args).parens()) + pform = prettyForm(*pform.left('RootSum')) + + return pform + + def _print_FiniteField(self, expr): + if self._use_unicode: + form = f"{pretty_atom('Integers')}_%d" + else: + form = 'GF(%d)' + + return prettyForm(pretty_symbol(form % expr.mod)) + + def _print_IntegerRing(self, expr): + if self._use_unicode: + return prettyForm(pretty_atom('Integers')) + else: + return prettyForm('ZZ') + + def _print_RationalField(self, expr): + if self._use_unicode: + return prettyForm(pretty_atom('Rationals')) + else: + return prettyForm('QQ') + + def _print_RealField(self, domain): + if self._use_unicode: + prefix = pretty_atom("Reals") + else: + prefix = 'RR' + + if domain.has_default_precision: + return prettyForm(prefix) + else: + return self._print(pretty_symbol(prefix + "_" + str(domain.precision))) + + def _print_ComplexField(self, domain): + if self._use_unicode: + prefix = pretty_atom('Complexes') + else: + prefix = 'CC' + + if domain.has_default_precision: + return prettyForm(prefix) + else: + return self._print(pretty_symbol(prefix + "_" + str(domain.precision))) + + def _print_PolynomialRing(self, expr): + args = list(expr.symbols) + + if not expr.order.is_default: + order = prettyForm(*prettyForm("order=").right(self._print(expr.order))) + args.append(order) + + pform = self._print_seq(args, '[', ']') + pform = prettyForm(*pform.left(self._print(expr.domain))) + + return pform + + def _print_FractionField(self, expr): + args = list(expr.symbols) + + if not expr.order.is_default: + order = prettyForm(*prettyForm("order=").right(self._print(expr.order))) + args.append(order) + + pform = self._print_seq(args, '(', ')') + pform = prettyForm(*pform.left(self._print(expr.domain))) + + return pform + + def _print_PolynomialRingBase(self, expr): + g = expr.symbols + if str(expr.order) != str(expr.default_order): + g = g + ("order=" + str(expr.order),) + pform = self._print_seq(g, '[', ']') + pform = prettyForm(*pform.left(self._print(expr.domain))) + + return pform + + def _print_GroebnerBasis(self, basis): + exprs = [ self._print_Add(arg, order=basis.order) + for arg in basis.exprs ] + exprs = prettyForm(*self.join(", ", exprs).parens(left="[", right="]")) + + gens = [ self._print(gen) for gen in basis.gens ] + + domain = prettyForm( + *prettyForm("domain=").right(self._print(basis.domain))) + order = prettyForm( + *prettyForm("order=").right(self._print(basis.order))) + + pform = self.join(", ", [exprs] + gens + [domain, order]) + + pform = prettyForm(*pform.parens()) + pform = prettyForm(*pform.left(basis.__class__.__name__)) + + return pform + + def _print_Subs(self, e): + pform = self._print(e.expr) + pform = prettyForm(*pform.parens()) + + h = pform.height() if pform.height() > 1 else 2 + rvert = stringPict(vobj('|', h), baseline=pform.baseline) + pform = prettyForm(*pform.right(rvert)) + + b = pform.baseline + pform.baseline = pform.height() - 1 + pform = prettyForm(*pform.right(self._print_seq([ + self._print_seq((self._print(v[0]), xsym('=='), self._print(v[1])), + delimiter='') for v in zip(e.variables, e.point) ]))) + + pform.baseline = b + return pform + + def _print_number_function(self, e, name): + # Print name_arg[0] for one argument or name_arg[0](arg[1]) + # for more than one argument + pform = prettyForm(name) + arg = self._print(e.args[0]) + pform_arg = prettyForm(" "*arg.width()) + pform_arg = prettyForm(*pform_arg.below(arg)) + pform = prettyForm(*pform.right(pform_arg)) + if len(e.args) == 1: + return pform + m, x = e.args + # TODO: copy-pasted from _print_Function: can we do better? + prettyFunc = pform + prettyArgs = prettyForm(*self._print_seq([x]).parens()) + pform = prettyForm( + binding=prettyForm.FUNC, *stringPict.next(prettyFunc, prettyArgs)) + pform.prettyFunc = prettyFunc + pform.prettyArgs = prettyArgs + return pform + + def _print_euler(self, e): + return self._print_number_function(e, "E") + + def _print_catalan(self, e): + return self._print_number_function(e, "C") + + def _print_bernoulli(self, e): + return self._print_number_function(e, "B") + + _print_bell = _print_bernoulli + + def _print_lucas(self, e): + return self._print_number_function(e, "L") + + def _print_fibonacci(self, e): + return self._print_number_function(e, "F") + + def _print_tribonacci(self, e): + return self._print_number_function(e, "T") + + def _print_stieltjes(self, e): + if self._use_unicode: + return self._print_number_function(e, greek_unicode['gamma']) + else: + return self._print_number_function(e, "stieltjes") + + def _print_KroneckerDelta(self, e): + pform = self._print(e.args[0]) + pform = prettyForm(*pform.right(prettyForm(','))) + pform = prettyForm(*pform.right(self._print(e.args[1]))) + if self._use_unicode: + a = stringPict(pretty_symbol('delta')) + else: + a = stringPict('d') + b = pform + top = stringPict(*b.left(' '*a.width())) + bot = stringPict(*a.right(' '*b.width())) + return prettyForm(binding=prettyForm.POW, *bot.below(top)) + + def _print_RandomDomain(self, d): + if hasattr(d, 'as_boolean'): + pform = self._print('Domain: ') + pform = prettyForm(*pform.right(self._print(d.as_boolean()))) + return pform + elif hasattr(d, 'set'): + pform = self._print('Domain: ') + pform = prettyForm(*pform.right(self._print(d.symbols))) + pform = prettyForm(*pform.right(self._print(' in '))) + pform = prettyForm(*pform.right(self._print(d.set))) + return pform + elif hasattr(d, 'symbols'): + pform = self._print('Domain on ') + pform = prettyForm(*pform.right(self._print(d.symbols))) + return pform + else: + return self._print(None) + + def _print_DMP(self, p): + try: + if p.ring is not None: + # TODO incorporate order + return self._print(p.ring.to_sympy(p)) + except SympifyError: + pass + return self._print(repr(p)) + + def _print_DMF(self, p): + return self._print_DMP(p) + + def _print_Object(self, object): + return self._print(pretty_symbol(object.name)) + + def _print_Morphism(self, morphism): + arrow = xsym("-->") + + domain = self._print(morphism.domain) + codomain = self._print(morphism.codomain) + tail = domain.right(arrow, codomain)[0] + + return prettyForm(tail) + + def _print_NamedMorphism(self, morphism): + pretty_name = self._print(pretty_symbol(morphism.name)) + pretty_morphism = self._print_Morphism(morphism) + return prettyForm(pretty_name.right(":", pretty_morphism)[0]) + + def _print_IdentityMorphism(self, morphism): + from sympy.categories import NamedMorphism + return self._print_NamedMorphism( + NamedMorphism(morphism.domain, morphism.codomain, "id")) + + def _print_CompositeMorphism(self, morphism): + + circle = xsym(".") + + # All components of the morphism have names and it is thus + # possible to build the name of the composite. + component_names_list = [pretty_symbol(component.name) for + component in morphism.components] + component_names_list.reverse() + component_names = circle.join(component_names_list) + ":" + + pretty_name = self._print(component_names) + pretty_morphism = self._print_Morphism(morphism) + return prettyForm(pretty_name.right(pretty_morphism)[0]) + + def _print_Category(self, category): + return self._print(pretty_symbol(category.name)) + + def _print_Diagram(self, diagram): + if not diagram.premises: + # This is an empty diagram. + return self._print(S.EmptySet) + + pretty_result = self._print(diagram.premises) + if diagram.conclusions: + results_arrow = " %s " % xsym("==>") + + pretty_conclusions = self._print(diagram.conclusions)[0] + pretty_result = pretty_result.right( + results_arrow, pretty_conclusions) + + return prettyForm(pretty_result[0]) + + def _print_DiagramGrid(self, grid): + from sympy.matrices import Matrix + matrix = Matrix([[grid[i, j] if grid[i, j] else Symbol(" ") + for j in range(grid.width)] + for i in range(grid.height)]) + return self._print_matrix_contents(matrix) + + def _print_FreeModuleElement(self, m): + # Print as row vector for convenience, for now. + return self._print_seq(m, '[', ']') + + def _print_SubModule(self, M): + gens = [[M.ring.to_sympy(g) for g in gen] for gen in M.gens] + return self._print_seq(gens, '<', '>') + + def _print_FreeModule(self, M): + return self._print(M.ring)**self._print(M.rank) + + def _print_ModuleImplementedIdeal(self, M): + sym = M.ring.to_sympy + return self._print_seq([sym(x) for [x] in M._module.gens], '<', '>') + + def _print_QuotientRing(self, R): + return self._print(R.ring) / self._print(R.base_ideal) + + def _print_QuotientRingElement(self, R): + return self._print(R.ring.to_sympy(R)) + self._print(R.ring.base_ideal) + + def _print_QuotientModuleElement(self, m): + return self._print(m.data) + self._print(m.module.killed_module) + + def _print_QuotientModule(self, M): + return self._print(M.base) / self._print(M.killed_module) + + def _print_MatrixHomomorphism(self, h): + matrix = self._print(h._sympy_matrix()) + matrix.baseline = matrix.height() // 2 + pform = prettyForm(*matrix.right(' : ', self._print(h.domain), + ' %s> ' % hobj('-', 2), self._print(h.codomain))) + return pform + + def _print_Manifold(self, manifold): + return self._print(manifold.name) + + def _print_Patch(self, patch): + return self._print(patch.name) + + def _print_CoordSystem(self, coords): + return self._print(coords.name) + + def _print_BaseScalarField(self, field): + string = field._coord_sys.symbols[field._index].name + return self._print(pretty_symbol(string)) + + def _print_BaseVectorField(self, field): + s = U('PARTIAL DIFFERENTIAL') + '_' + field._coord_sys.symbols[field._index].name + return self._print(pretty_symbol(s)) + + def _print_Differential(self, diff): + if self._use_unicode: + d = pretty_atom('Differential') + else: + d = 'd' + field = diff._form_field + if hasattr(field, '_coord_sys'): + string = field._coord_sys.symbols[field._index].name + return self._print(d + ' ' + pretty_symbol(string)) + else: + pform = self._print(field) + pform = prettyForm(*pform.parens()) + return prettyForm(*pform.left(d)) + + def _print_Tr(self, p): + #TODO: Handle indices + pform = self._print(p.args[0]) + pform = prettyForm(*pform.left('%s(' % (p.__class__.__name__))) + pform = prettyForm(*pform.right(')')) + return pform + + def _print_primenu(self, e): + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens()) + if self._use_unicode: + pform = prettyForm(*pform.left(greek_unicode['nu'])) + else: + pform = prettyForm(*pform.left('nu')) + return pform + + def _print_primeomega(self, e): + pform = self._print(e.args[0]) + pform = prettyForm(*pform.parens()) + if self._use_unicode: + pform = prettyForm(*pform.left(greek_unicode['Omega'])) + else: + pform = prettyForm(*pform.left('Omega')) + return pform + + def _print_Quantity(self, e): + if e.name.name == 'degree': + if self._use_unicode: + pform = self._print(pretty_atom('Degree')) + else: + pform = self._print(chr(176)) + return pform + else: + return self.emptyPrinter(e) + + def _print_AssignmentBase(self, e): + + op = prettyForm(' ' + xsym(e.op) + ' ') + + l = self._print(e.lhs) + r = self._print(e.rhs) + pform = prettyForm(*stringPict.next(l, op, r)) + return pform + + def _print_Str(self, s): + return self._print(s.name) + + +@print_function(PrettyPrinter) +def pretty(expr, **settings): + """Returns a string containing the prettified form of expr. + + For information on keyword arguments see pretty_print function. + + """ + pp = PrettyPrinter(settings) + + # XXX: this is an ugly hack, but at least it works + use_unicode = pp._settings['use_unicode'] + uflag = pretty_use_unicode(use_unicode) + + try: + return pp.doprint(expr) + finally: + pretty_use_unicode(uflag) + + +def pretty_print(expr, **kwargs): + """Prints expr in pretty form. + + pprint is just a shortcut for this function. + + Parameters + ========== + + expr : expression + The expression to print. + + wrap_line : bool, optional (default=True) + Line wrapping enabled/disabled. + + num_columns : int or None, optional (default=None) + Number of columns before line breaking (default to None which reads + the terminal width), useful when using SymPy without terminal. + + use_unicode : bool or None, optional (default=None) + Use unicode characters, such as the Greek letter pi instead of + the string pi. + + full_prec : bool or string, optional (default="auto") + Use full precision. + + order : bool or string, optional (default=None) + Set to 'none' for long expressions if slow; default is None. + + use_unicode_sqrt_char : bool, optional (default=True) + Use compact single-character square root symbol (when unambiguous). + + root_notation : bool, optional (default=True) + Set to 'False' for printing exponents of the form 1/n in fractional form. + By default exponent is printed in root form. + + mat_symbol_style : string, optional (default="plain") + Set to "bold" for printing MatrixSymbols using a bold mathematical symbol face. + By default the standard face is used. + + imaginary_unit : string, optional (default="i") + Letter to use for imaginary unit when use_unicode is True. + Can be "i" (default) or "j". + """ + print(pretty(expr, **kwargs)) + +pprint = pretty_print + + +def pager_print(expr, **settings): + """Prints expr using the pager, in pretty form. + + This invokes a pager command using pydoc. Lines are not wrapped + automatically. This routine is meant to be used with a pager that allows + sideways scrolling, like ``less -S``. + + Parameters are the same as for ``pretty_print``. If you wish to wrap lines, + pass ``num_columns=None`` to auto-detect the width of the terminal. + + """ + from pydoc import pager + from locale import getpreferredencoding + if 'num_columns' not in settings: + settings['num_columns'] = 500000 # disable line wrap + pager(pretty(expr, **settings).encode(getpreferredencoding())) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/pretty_symbology.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/pretty_symbology.py new file mode 100644 index 0000000000000000000000000000000000000000..bdb6ec556c6ed7b15dfcddcfc3da189102d5395b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/pretty_symbology.py @@ -0,0 +1,731 @@ +"""Symbolic primitives + unicode/ASCII abstraction for pretty.py""" + +import sys +import warnings +from string import ascii_lowercase, ascii_uppercase +import unicodedata + +unicode_warnings = '' + +def U(name): + """ + Get a unicode character by name or, None if not found. + + This exists because older versions of Python use older unicode databases. + """ + try: + return unicodedata.lookup(name) + except KeyError: + global unicode_warnings + unicode_warnings += 'No \'%s\' in unicodedata\n' % name + return None + +from sympy.printing.conventions import split_super_sub +from sympy.core.alphabets import greeks +from sympy.utilities.exceptions import sympy_deprecation_warning + +# prefix conventions when constructing tables +# L - LATIN i +# G - GREEK beta +# D - DIGIT 0 +# S - SYMBOL + + + +__all__ = ['greek_unicode', 'sub', 'sup', 'xsym', 'vobj', 'hobj', 'pretty_symbol', + 'annotated', 'center_pad', 'center'] + + +_use_unicode = False + + +def pretty_use_unicode(flag=None): + """Set whether pretty-printer should use unicode by default""" + global _use_unicode, unicode_warnings + if flag is None: + return _use_unicode + + if flag and unicode_warnings: + # print warnings (if any) on first unicode usage + warnings.warn(unicode_warnings) + unicode_warnings = '' + + use_unicode_prev = _use_unicode + _use_unicode = flag + return use_unicode_prev + + +def pretty_try_use_unicode(): + """See if unicode output is available and leverage it if possible""" + + encoding = getattr(sys.stdout, 'encoding', None) + + # this happens when e.g. stdout is redirected through a pipe, or is + # e.g. a cStringIO.StringO + if encoding is None: + return # sys.stdout has no encoding + + symbols = [] + + # see if we can represent greek alphabet + symbols += greek_unicode.values() + + # and atoms + symbols += atoms_table.values() + + for s in symbols: + if s is None: + return # common symbols not present! + + try: + s.encode(encoding) + except UnicodeEncodeError: + return + + # all the characters were present and encodable + pretty_use_unicode(True) + + +def xstr(*args): + sympy_deprecation_warning( + """ + The sympy.printing.pretty.pretty_symbology.xstr() function is + deprecated. Use str() instead. + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-pretty-printing-functions" + ) + return str(*args) + +# GREEK +g = lambda l: U('GREEK SMALL LETTER %s' % l.upper()) +G = lambda l: U('GREEK CAPITAL LETTER %s' % l.upper()) + +greek_letters = list(greeks) # make a copy +# deal with Unicode's funny spelling of lambda +greek_letters[greek_letters.index('lambda')] = 'lamda' + +# {} greek letter -> (g,G) +greek_unicode = {L: g(L) for L in greek_letters} +greek_unicode.update((L[0].upper() + L[1:], G(L)) for L in greek_letters) + +# aliases +greek_unicode['lambda'] = greek_unicode['lamda'] +greek_unicode['Lambda'] = greek_unicode['Lamda'] +greek_unicode['varsigma'] = '\N{GREEK SMALL LETTER FINAL SIGMA}' + +# BOLD +b = lambda l: U('MATHEMATICAL BOLD SMALL %s' % l.upper()) +B = lambda l: U('MATHEMATICAL BOLD CAPITAL %s' % l.upper()) + +bold_unicode = {l: b(l) for l in ascii_lowercase} +bold_unicode.update((L, B(L)) for L in ascii_uppercase) + +# GREEK BOLD +gb = lambda l: U('MATHEMATICAL BOLD SMALL %s' % l.upper()) +GB = lambda l: U('MATHEMATICAL BOLD CAPITAL %s' % l.upper()) + +greek_bold_letters = list(greeks) # make a copy, not strictly required here +# deal with Unicode's funny spelling of lambda +greek_bold_letters[greek_bold_letters.index('lambda')] = 'lamda' + +# {} greek letter -> (g,G) +greek_bold_unicode = {L: g(L) for L in greek_bold_letters} +greek_bold_unicode.update((L[0].upper() + L[1:], G(L)) for L in greek_bold_letters) +greek_bold_unicode['lambda'] = greek_unicode['lamda'] +greek_bold_unicode['Lambda'] = greek_unicode['Lamda'] +greek_bold_unicode['varsigma'] = '\N{MATHEMATICAL BOLD SMALL FINAL SIGMA}' + +digit_2txt = { + '0': 'ZERO', + '1': 'ONE', + '2': 'TWO', + '3': 'THREE', + '4': 'FOUR', + '5': 'FIVE', + '6': 'SIX', + '7': 'SEVEN', + '8': 'EIGHT', + '9': 'NINE', +} + +symb_2txt = { + '+': 'PLUS SIGN', + '-': 'MINUS', + '=': 'EQUALS SIGN', + '(': 'LEFT PARENTHESIS', + ')': 'RIGHT PARENTHESIS', + '[': 'LEFT SQUARE BRACKET', + ']': 'RIGHT SQUARE BRACKET', + '{': 'LEFT CURLY BRACKET', + '}': 'RIGHT CURLY BRACKET', + + # non-std + '{}': 'CURLY BRACKET', + 'sum': 'SUMMATION', + 'int': 'INTEGRAL', +} + +# SUBSCRIPT & SUPERSCRIPT +LSUB = lambda letter: U('LATIN SUBSCRIPT SMALL LETTER %s' % letter.upper()) +GSUB = lambda letter: U('GREEK SUBSCRIPT SMALL LETTER %s' % letter.upper()) +DSUB = lambda digit: U('SUBSCRIPT %s' % digit_2txt[digit]) +SSUB = lambda symb: U('SUBSCRIPT %s' % symb_2txt[symb]) + +LSUP = lambda letter: U('SUPERSCRIPT LATIN SMALL LETTER %s' % letter.upper()) +DSUP = lambda digit: U('SUPERSCRIPT %s' % digit_2txt[digit]) +SSUP = lambda symb: U('SUPERSCRIPT %s' % symb_2txt[symb]) + +sub = {} # symb -> subscript symbol +sup = {} # symb -> superscript symbol + +# latin subscripts +for l in 'aeioruvxhklmnpst': + sub[l] = LSUB(l) + +for l in 'in': + sup[l] = LSUP(l) + +for gl in ['beta', 'gamma', 'rho', 'phi', 'chi']: + sub[gl] = GSUB(gl) + +for d in [str(i) for i in range(10)]: + sub[d] = DSUB(d) + sup[d] = DSUP(d) + +for s in '+-=()': + sub[s] = SSUB(s) + sup[s] = SSUP(s) + +# Variable modifiers +# TODO: Make brackets adjust to height of contents +modifier_dict = { + # Accents + 'mathring': lambda s: center_accent(s, '\N{COMBINING RING ABOVE}'), + 'ddddot': lambda s: center_accent(s, '\N{COMBINING FOUR DOTS ABOVE}'), + 'dddot': lambda s: center_accent(s, '\N{COMBINING THREE DOTS ABOVE}'), + 'ddot': lambda s: center_accent(s, '\N{COMBINING DIAERESIS}'), + 'dot': lambda s: center_accent(s, '\N{COMBINING DOT ABOVE}'), + 'check': lambda s: center_accent(s, '\N{COMBINING CARON}'), + 'breve': lambda s: center_accent(s, '\N{COMBINING BREVE}'), + 'acute': lambda s: center_accent(s, '\N{COMBINING ACUTE ACCENT}'), + 'grave': lambda s: center_accent(s, '\N{COMBINING GRAVE ACCENT}'), + 'tilde': lambda s: center_accent(s, '\N{COMBINING TILDE}'), + 'hat': lambda s: center_accent(s, '\N{COMBINING CIRCUMFLEX ACCENT}'), + 'bar': lambda s: center_accent(s, '\N{COMBINING OVERLINE}'), + 'vec': lambda s: center_accent(s, '\N{COMBINING RIGHT ARROW ABOVE}'), + 'prime': lambda s: s+'\N{PRIME}', + 'prm': lambda s: s+'\N{PRIME}', + # # Faces -- these are here for some compatibility with latex printing + # 'bold': lambda s: s, + # 'bm': lambda s: s, + # 'cal': lambda s: s, + # 'scr': lambda s: s, + # 'frak': lambda s: s, + # Brackets + 'norm': lambda s: '\N{DOUBLE VERTICAL LINE}'+s+'\N{DOUBLE VERTICAL LINE}', + 'avg': lambda s: '\N{MATHEMATICAL LEFT ANGLE BRACKET}'+s+'\N{MATHEMATICAL RIGHT ANGLE BRACKET}', + 'abs': lambda s: '\N{VERTICAL LINE}'+s+'\N{VERTICAL LINE}', + 'mag': lambda s: '\N{VERTICAL LINE}'+s+'\N{VERTICAL LINE}', +} + +# VERTICAL OBJECTS +HUP = lambda symb: U('%s UPPER HOOK' % symb_2txt[symb]) +CUP = lambda symb: U('%s UPPER CORNER' % symb_2txt[symb]) +MID = lambda symb: U('%s MIDDLE PIECE' % symb_2txt[symb]) +EXT = lambda symb: U('%s EXTENSION' % symb_2txt[symb]) +HLO = lambda symb: U('%s LOWER HOOK' % symb_2txt[symb]) +CLO = lambda symb: U('%s LOWER CORNER' % symb_2txt[symb]) +TOP = lambda symb: U('%s TOP' % symb_2txt[symb]) +BOT = lambda symb: U('%s BOTTOM' % symb_2txt[symb]) + +# {} '(' -> (extension, start, end, middle) 1-character +_xobj_unicode = { + + # vertical symbols + # (( ext, top, bot, mid ), c1) + '(': (( EXT('('), HUP('('), HLO('(') ), '('), + ')': (( EXT(')'), HUP(')'), HLO(')') ), ')'), + '[': (( EXT('['), CUP('['), CLO('[') ), '['), + ']': (( EXT(']'), CUP(']'), CLO(']') ), ']'), + '{': (( EXT('{}'), HUP('{'), HLO('{'), MID('{') ), '{'), + '}': (( EXT('{}'), HUP('}'), HLO('}'), MID('}') ), '}'), + '|': U('BOX DRAWINGS LIGHT VERTICAL'), + 'Tee': U('BOX DRAWINGS LIGHT UP AND HORIZONTAL'), + 'UpTack': U('BOX DRAWINGS LIGHT DOWN AND HORIZONTAL'), + 'corner_up_centre' + '(_ext': U('LEFT PARENTHESIS EXTENSION'), + ')_ext': U('RIGHT PARENTHESIS EXTENSION'), + '(_lower_hook': U('LEFT PARENTHESIS LOWER HOOK'), + ')_lower_hook': U('RIGHT PARENTHESIS LOWER HOOK'), + '(_upper_hook': U('LEFT PARENTHESIS UPPER HOOK'), + ')_upper_hook': U('RIGHT PARENTHESIS UPPER HOOK'), + '<': ((U('BOX DRAWINGS LIGHT VERTICAL'), + U('BOX DRAWINGS LIGHT DIAGONAL UPPER RIGHT TO LOWER LEFT'), + U('BOX DRAWINGS LIGHT DIAGONAL UPPER LEFT TO LOWER RIGHT')), '<'), + + '>': ((U('BOX DRAWINGS LIGHT VERTICAL'), + U('BOX DRAWINGS LIGHT DIAGONAL UPPER LEFT TO LOWER RIGHT'), + U('BOX DRAWINGS LIGHT DIAGONAL UPPER RIGHT TO LOWER LEFT')), '>'), + + 'lfloor': (( EXT('['), EXT('['), CLO('[') ), U('LEFT FLOOR')), + 'rfloor': (( EXT(']'), EXT(']'), CLO(']') ), U('RIGHT FLOOR')), + 'lceil': (( EXT('['), CUP('['), EXT('[') ), U('LEFT CEILING')), + 'rceil': (( EXT(']'), CUP(']'), EXT(']') ), U('RIGHT CEILING')), + + 'int': (( EXT('int'), U('TOP HALF INTEGRAL'), U('BOTTOM HALF INTEGRAL') ), U('INTEGRAL')), + 'sum': (( U('BOX DRAWINGS LIGHT DIAGONAL UPPER LEFT TO LOWER RIGHT'), '_', U('OVERLINE'), U('BOX DRAWINGS LIGHT DIAGONAL UPPER RIGHT TO LOWER LEFT')), U('N-ARY SUMMATION')), + + # horizontal objects + #'-': '-', + '-': U('BOX DRAWINGS LIGHT HORIZONTAL'), + '_': U('LOW LINE'), + # We used to use this, but LOW LINE looks better for roots, as it's a + # little lower (i.e., it lines up with the / perfectly. But perhaps this + # one would still be wanted for some cases? + # '_': U('HORIZONTAL SCAN LINE-9'), + + # diagonal objects '\' & '/' ? + '/': U('BOX DRAWINGS LIGHT DIAGONAL UPPER RIGHT TO LOWER LEFT'), + '\\': U('BOX DRAWINGS LIGHT DIAGONAL UPPER LEFT TO LOWER RIGHT'), +} + +_xobj_ascii = { + # vertical symbols + # (( ext, top, bot, mid ), c1) + '(': (( '|', '/', '\\' ), '('), + ')': (( '|', '\\', '/' ), ')'), + +# XXX this looks ugly +# '[': (( '|', '-', '-' ), '['), +# ']': (( '|', '-', '-' ), ']'), +# XXX not so ugly :( + '[': (( '[', '[', '[' ), '['), + ']': (( ']', ']', ']' ), ']'), + + '{': (( '|', '/', '\\', '<' ), '{'), + '}': (( '|', '\\', '/', '>' ), '}'), + '|': '|', + + '<': (( '|', '/', '\\' ), '<'), + '>': (( '|', '\\', '/' ), '>'), + + 'int': ( ' | ', ' /', '/ ' ), + + # horizontal objects + '-': '-', + '_': '_', + + # diagonal objects '\' & '/' ? + '/': '/', + '\\': '\\', +} + + +def xobj(symb, length): + """Construct spatial object of given length. + + return: [] of equal-length strings + """ + + if length <= 0: + raise ValueError("Length should be greater than 0") + + # TODO robustify when no unicodedat available + if _use_unicode: + _xobj = _xobj_unicode + else: + _xobj = _xobj_ascii + + vinfo = _xobj[symb] + + c1 = top = bot = mid = None + + if not isinstance(vinfo, tuple): # 1 entry + ext = vinfo + else: + if isinstance(vinfo[0], tuple): # (vlong), c1 + vlong = vinfo[0] + c1 = vinfo[1] + else: # (vlong), c1 + vlong = vinfo + + ext = vlong[0] + + try: + top = vlong[1] + bot = vlong[2] + mid = vlong[3] + except IndexError: + pass + + if c1 is None: + c1 = ext + if top is None: + top = ext + if bot is None: + bot = ext + if mid is not None: + if (length % 2) == 0: + # even height, but we have to print it somehow anyway... + # XXX is it ok? + length += 1 + + else: + mid = ext + + if length == 1: + return c1 + + res = [] + next = (length - 2)//2 + nmid = (length - 2) - next*2 + + res += [top] + res += [ext]*next + res += [mid]*nmid + res += [ext]*next + res += [bot] + + return res + + +def vobj(symb, height): + """Construct vertical object of a given height + + see: xobj + """ + return '\n'.join( xobj(symb, height) ) + + +def hobj(symb, width): + """Construct horizontal object of a given width + + see: xobj + """ + return ''.join( xobj(symb, width) ) + +# RADICAL +# n -> symbol +root = { + 2: U('SQUARE ROOT'), # U('RADICAL SYMBOL BOTTOM') + 3: U('CUBE ROOT'), + 4: U('FOURTH ROOT'), +} + + +# RATIONAL +VF = lambda txt: U('VULGAR FRACTION %s' % txt) + +# (p,q) -> symbol +frac = { + (1, 2): VF('ONE HALF'), + (1, 3): VF('ONE THIRD'), + (2, 3): VF('TWO THIRDS'), + (1, 4): VF('ONE QUARTER'), + (3, 4): VF('THREE QUARTERS'), + (1, 5): VF('ONE FIFTH'), + (2, 5): VF('TWO FIFTHS'), + (3, 5): VF('THREE FIFTHS'), + (4, 5): VF('FOUR FIFTHS'), + (1, 6): VF('ONE SIXTH'), + (5, 6): VF('FIVE SIXTHS'), + (1, 8): VF('ONE EIGHTH'), + (3, 8): VF('THREE EIGHTHS'), + (5, 8): VF('FIVE EIGHTHS'), + (7, 8): VF('SEVEN EIGHTHS'), +} + + +# atom symbols +_xsym = { + '==': ('=', '='), + '<': ('<', '<'), + '>': ('>', '>'), + '<=': ('<=', U('LESS-THAN OR EQUAL TO')), + '>=': ('>=', U('GREATER-THAN OR EQUAL TO')), + '!=': ('!=', U('NOT EQUAL TO')), + ':=': (':=', ':='), + '+=': ('+=', '+='), + '-=': ('-=', '-='), + '*=': ('*=', '*='), + '/=': ('/=', '/='), + '%=': ('%=', '%='), + '*': ('*', U('DOT OPERATOR')), + '-->': ('-->', U('EM DASH') + U('EM DASH') + + U('BLACK RIGHT-POINTING TRIANGLE') if U('EM DASH') + and U('BLACK RIGHT-POINTING TRIANGLE') else None), + '==>': ('==>', U('BOX DRAWINGS DOUBLE HORIZONTAL') + + U('BOX DRAWINGS DOUBLE HORIZONTAL') + + U('BLACK RIGHT-POINTING TRIANGLE') if + U('BOX DRAWINGS DOUBLE HORIZONTAL') and + U('BOX DRAWINGS DOUBLE HORIZONTAL') and + U('BLACK RIGHT-POINTING TRIANGLE') else None), + '.': ('*', U('RING OPERATOR')), +} + + +def xsym(sym): + """get symbology for a 'character'""" + op = _xsym[sym] + + if _use_unicode: + return op[1] + else: + return op[0] + + +# SYMBOLS + +atoms_table = { + # class how-to-display + 'Exp1': U('SCRIPT SMALL E'), + 'Pi': U('GREEK SMALL LETTER PI'), + 'Infinity': U('INFINITY'), + 'NegativeInfinity': U('INFINITY') and ('-' + U('INFINITY')), # XXX what to do here + #'ImaginaryUnit': U('GREEK SMALL LETTER IOTA'), + #'ImaginaryUnit': U('MATHEMATICAL ITALIC SMALL I'), + 'ImaginaryUnit': U('DOUBLE-STRUCK ITALIC SMALL I'), + 'EmptySet': U('EMPTY SET'), + 'Naturals': U('DOUBLE-STRUCK CAPITAL N'), + 'Naturals0': (U('DOUBLE-STRUCK CAPITAL N') and + (U('DOUBLE-STRUCK CAPITAL N') + + U('SUBSCRIPT ZERO'))), + 'Integers': U('DOUBLE-STRUCK CAPITAL Z'), + 'Rationals': U('DOUBLE-STRUCK CAPITAL Q'), + 'Reals': U('DOUBLE-STRUCK CAPITAL R'), + 'Complexes': U('DOUBLE-STRUCK CAPITAL C'), + 'Universe': U('MATHEMATICAL DOUBLE-STRUCK CAPITAL U'), + 'IdentityMatrix': U('MATHEMATICAL DOUBLE-STRUCK CAPITAL I'), + 'ZeroMatrix': U('MATHEMATICAL DOUBLE-STRUCK DIGIT ZERO'), + 'OneMatrix': U('MATHEMATICAL DOUBLE-STRUCK DIGIT ONE'), + 'Differential': U('DOUBLE-STRUCK ITALIC SMALL D'), + 'Union': U('UNION'), + 'ElementOf': U('ELEMENT OF'), + 'SmallElementOf': U('SMALL ELEMENT OF'), + 'SymmetricDifference': U('INCREMENT'), + 'Intersection': U('INTERSECTION'), + 'Ring': U('RING OPERATOR'), + 'Multiplication': U('MULTIPLICATION SIGN'), + 'TensorProduct': U('N-ARY CIRCLED TIMES OPERATOR'), + 'Dots': U('HORIZONTAL ELLIPSIS'), + 'Modifier Letter Low Ring':U('Modifier Letter Low Ring'), + 'EmptySequence': 'EmptySequence', + 'SuperscriptPlus': U('SUPERSCRIPT PLUS SIGN'), + 'SuperscriptMinus': U('SUPERSCRIPT MINUS'), + 'Dagger': U('DAGGER'), + 'Degree': U('DEGREE SIGN'), + #Logic Symbols + 'And': U('LOGICAL AND'), + 'Or': U('LOGICAL OR'), + 'Not': U('NOT SIGN'), + 'Nor': U('NOR'), + 'Nand': U('NAND'), + 'Xor': U('XOR'), + 'Equiv': U('LEFT RIGHT DOUBLE ARROW'), + 'NotEquiv': U('LEFT RIGHT DOUBLE ARROW WITH STROKE'), + 'Implies': U('LEFT RIGHT DOUBLE ARROW'), + 'NotImplies': U('LEFT RIGHT DOUBLE ARROW WITH STROKE'), + 'Arrow': U('RIGHTWARDS ARROW'), + 'ArrowFromBar': U('RIGHTWARDS ARROW FROM BAR'), + 'NotArrow': U('RIGHTWARDS ARROW WITH STROKE'), + 'Tautology': U('BOX DRAWINGS LIGHT UP AND HORIZONTAL'), + 'Contradiction': U('BOX DRAWINGS LIGHT DOWN AND HORIZONTAL') +} + + +def pretty_atom(atom_name, default=None, printer=None): + """return pretty representation of an atom""" + if _use_unicode: + if printer is not None and atom_name == 'ImaginaryUnit' and printer._settings['imaginary_unit'] == 'j': + return U('DOUBLE-STRUCK ITALIC SMALL J') + else: + return atoms_table[atom_name] + else: + if default is not None: + return default + + raise KeyError('only unicode') # send it default printer + + +def pretty_symbol(symb_name, bold_name=False): + """return pretty representation of a symbol""" + # let's split symb_name into symbol + index + # UC: beta1 + # UC: f_beta + + if not _use_unicode: + return symb_name + + name, sups, subs = split_super_sub(symb_name) + + def translate(s, bold_name) : + if bold_name: + gG = greek_bold_unicode.get(s) + else: + gG = greek_unicode.get(s) + if gG is not None: + return gG + for key in sorted(modifier_dict.keys(), key=lambda k:len(k), reverse=True) : + if s.lower().endswith(key) and len(s)>len(key): + return modifier_dict[key](translate(s[:-len(key)], bold_name)) + if bold_name: + return ''.join([bold_unicode[c] for c in s]) + return s + + name = translate(name, bold_name) + + # Let's prettify sups/subs. If it fails at one of them, pretty sups/subs are + # not used at all. + def pretty_list(l, mapping): + result = [] + for s in l: + pretty = mapping.get(s) + if pretty is None: + try: # match by separate characters + pretty = ''.join([mapping[c] for c in s]) + except (TypeError, KeyError): + return None + result.append(pretty) + return result + + pretty_sups = pretty_list(sups, sup) + if pretty_sups is not None: + pretty_subs = pretty_list(subs, sub) + else: + pretty_subs = None + + # glue the results into one string + if pretty_subs is None: # nice formatting of sups/subs did not work + if subs: + name += '_'+'_'.join([translate(s, bold_name) for s in subs]) + if sups: + name += '__'+'__'.join([translate(s, bold_name) for s in sups]) + return name + else: + sups_result = ' '.join(pretty_sups) + subs_result = ' '.join(pretty_subs) + + return ''.join([name, sups_result, subs_result]) + + +def annotated(letter): + """ + Return a stylised drawing of the letter ``letter``, together with + information on how to put annotations (super- and subscripts to the + left and to the right) on it. + + See pretty.py functions _print_meijerg, _print_hyper on how to use this + information. + """ + ucode_pics = { + 'F': (2, 0, 2, 0, '\N{BOX DRAWINGS LIGHT DOWN AND RIGHT}\N{BOX DRAWINGS LIGHT HORIZONTAL}\n' + '\N{BOX DRAWINGS LIGHT VERTICAL AND RIGHT}\N{BOX DRAWINGS LIGHT HORIZONTAL}\n' + '\N{BOX DRAWINGS LIGHT UP}'), + 'G': (3, 0, 3, 1, '\N{BOX DRAWINGS LIGHT ARC DOWN AND RIGHT}\N{BOX DRAWINGS LIGHT HORIZONTAL}\N{BOX DRAWINGS LIGHT ARC DOWN AND LEFT}\n' + '\N{BOX DRAWINGS LIGHT VERTICAL}\N{BOX DRAWINGS LIGHT RIGHT}\N{BOX DRAWINGS LIGHT DOWN AND LEFT}\n' + '\N{BOX DRAWINGS LIGHT ARC UP AND RIGHT}\N{BOX DRAWINGS LIGHT HORIZONTAL}\N{BOX DRAWINGS LIGHT ARC UP AND LEFT}') + } + ascii_pics = { + 'F': (3, 0, 3, 0, ' _\n|_\n|\n'), + 'G': (3, 0, 3, 1, ' __\n/__\n\\_|') + } + + if _use_unicode: + return ucode_pics[letter] + else: + return ascii_pics[letter] + +_remove_combining = dict.fromkeys(list(range(ord('\N{COMBINING GRAVE ACCENT}'), ord('\N{COMBINING LATIN SMALL LETTER X}'))) + + list(range(ord('\N{COMBINING LEFT HARPOON ABOVE}'), ord('\N{COMBINING ASTERISK ABOVE}')))) + +def is_combining(sym): + """Check whether symbol is a unicode modifier. """ + + return ord(sym) in _remove_combining + + +def center_accent(string, accent): + """ + Returns a string with accent inserted on the middle character. Useful to + put combining accents on symbol names, including multi-character names. + + Parameters + ========== + + string : string + The string to place the accent in. + accent : string + The combining accent to insert + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Combining_character + .. [2] https://en.wikipedia.org/wiki/Combining_Diacritical_Marks + + """ + + # Accent is placed on the previous character, although it may not always look + # like that depending on console + midpoint = len(string) // 2 + 1 + firstpart = string[:midpoint] + secondpart = string[midpoint:] + return firstpart + accent + secondpart + + +def line_width(line): + """Unicode combining symbols (modifiers) are not ever displayed as + separate symbols and thus should not be counted + """ + return len(line.translate(_remove_combining)) + + +def is_subscriptable_in_unicode(subscript): + """ + Checks whether a string is subscriptable in unicode or not. + + Parameters + ========== + + subscript: the string which needs to be checked + + Examples + ======== + + >>> from sympy.printing.pretty.pretty_symbology import is_subscriptable_in_unicode + >>> is_subscriptable_in_unicode('abc') + False + >>> is_subscriptable_in_unicode('123') + True + + """ + return all(character in sub for character in subscript) + + +def center_pad(wstring, wtarget, fillchar=' '): + """ + Return the padding strings necessary to center a string of + wstring characters wide in a wtarget wide space. + + The line_width wstring should always be less or equal to wtarget + or else a ValueError will be raised. + """ + if wstring > wtarget: + raise ValueError('not enough space for string') + wdelta = wtarget - wstring + + wleft = wdelta // 2 # favor left '1 ' + wright = wdelta - wleft + + left = fillchar * wleft + right = fillchar * wright + + return left, right + + +def center(string, width, fillchar=' '): + """Return a centered string of length determined by `line_width` + that uses `fillchar` for padding. + """ + left, right = center_pad(line_width(string), width, fillchar) + return ''.join([left, string, right]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/stringpict.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/stringpict.py new file mode 100644 index 0000000000000000000000000000000000000000..b6055f09c83b2abbe0c492991aaee4dff5b34f49 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/stringpict.py @@ -0,0 +1,537 @@ +"""Prettyprinter by Jurjen Bos. +(I hate spammers: mail me at pietjepuk314 at the reverse of ku.oc.oohay). +All objects have a method that create a "stringPict", +that can be used in the str method for pretty printing. + +Updates by Jason Gedge (email at cs mun ca) + - terminal_string() method + - minor fixes and changes (mostly to prettyForm) + +TODO: + - Allow left/center/right alignment options for above/below and + top/center/bottom alignment options for left/right +""" + +import shutil + +from .pretty_symbology import hobj, vobj, xsym, xobj, pretty_use_unicode, line_width, center +from sympy.utilities.exceptions import sympy_deprecation_warning + +_GLOBAL_WRAP_LINE = None + +class stringPict: + """An ASCII picture. + The pictures are represented as a list of equal length strings. + """ + #special value for stringPict.below + LINE = 'line' + + def __init__(self, s, baseline=0): + """Initialize from string. + Multiline strings are centered. + """ + self.s = s + #picture is a string that just can be printed + self.picture = stringPict.equalLengths(s.splitlines()) + #baseline is the line number of the "base line" + self.baseline = baseline + self.binding = None + + @staticmethod + def equalLengths(lines): + # empty lines + if not lines: + return [''] + + width = max(line_width(line) for line in lines) + return [center(line, width) for line in lines] + + def height(self): + """The height of the picture in characters.""" + return len(self.picture) + + def width(self): + """The width of the picture in characters.""" + return line_width(self.picture[0]) + + @staticmethod + def next(*args): + """Put a string of stringPicts next to each other. + Returns string, baseline arguments for stringPict. + """ + #convert everything to stringPicts + objects = [] + for arg in args: + if isinstance(arg, str): + arg = stringPict(arg) + objects.append(arg) + + #make a list of pictures, with equal height and baseline + newBaseline = max(obj.baseline for obj in objects) + newHeightBelowBaseline = max( + obj.height() - obj.baseline + for obj in objects) + newHeight = newBaseline + newHeightBelowBaseline + + pictures = [] + for obj in objects: + oneEmptyLine = [' '*obj.width()] + basePadding = newBaseline - obj.baseline + totalPadding = newHeight - obj.height() + pictures.append( + oneEmptyLine * basePadding + + obj.picture + + oneEmptyLine * (totalPadding - basePadding)) + + result = [''.join(lines) for lines in zip(*pictures)] + return '\n'.join(result), newBaseline + + def right(self, *args): + r"""Put pictures next to this one. + Returns string, baseline arguments for stringPict. + (Multiline) strings are allowed, and are given a baseline of 0. + + Examples + ======== + + >>> from sympy.printing.pretty.stringpict import stringPict + >>> print(stringPict("10").right(" + ",stringPict("1\r-\r2",1))[0]) + 1 + 10 + - + 2 + + """ + return stringPict.next(self, *args) + + def left(self, *args): + """Put pictures (left to right) at left. + Returns string, baseline arguments for stringPict. + """ + return stringPict.next(*(args + (self,))) + + @staticmethod + def stack(*args): + """Put pictures on top of each other, + from top to bottom. + Returns string, baseline arguments for stringPict. + The baseline is the baseline of the second picture. + Everything is centered. + Baseline is the baseline of the second picture. + Strings are allowed. + The special value stringPict.LINE is a row of '-' extended to the width. + """ + #convert everything to stringPicts; keep LINE + objects = [] + for arg in args: + if arg is not stringPict.LINE and isinstance(arg, str): + arg = stringPict(arg) + objects.append(arg) + + #compute new width + newWidth = max( + obj.width() + for obj in objects + if obj is not stringPict.LINE) + + lineObj = stringPict(hobj('-', newWidth)) + + #replace LINE with proper lines + for i, obj in enumerate(objects): + if obj is stringPict.LINE: + objects[i] = lineObj + + #stack the pictures, and center the result + newPicture = [center(line, newWidth) for obj in objects for line in obj.picture] + newBaseline = objects[0].height() + objects[1].baseline + return '\n'.join(newPicture), newBaseline + + def below(self, *args): + """Put pictures under this picture. + Returns string, baseline arguments for stringPict. + Baseline is baseline of top picture + + Examples + ======== + + >>> from sympy.printing.pretty.stringpict import stringPict + >>> print(stringPict("x+3").below( + ... stringPict.LINE, '3')[0]) #doctest: +NORMALIZE_WHITESPACE + x+3 + --- + 3 + + """ + s, baseline = stringPict.stack(self, *args) + return s, self.baseline + + def above(self, *args): + """Put pictures above this picture. + Returns string, baseline arguments for stringPict. + Baseline is baseline of bottom picture. + """ + string, baseline = stringPict.stack(*(args + (self,))) + baseline = len(string.splitlines()) - self.height() + self.baseline + return string, baseline + + def parens(self, left='(', right=')', ifascii_nougly=False): + """Put parentheses around self. + Returns string, baseline arguments for stringPict. + + left or right can be None or empty string which means 'no paren from + that side' + """ + h = self.height() + b = self.baseline + + # XXX this is a hack -- ascii parens are ugly! + if ifascii_nougly and not pretty_use_unicode(): + h = 1 + b = 0 + + res = self + + if left: + lparen = stringPict(vobj(left, h), baseline=b) + res = stringPict(*lparen.right(self)) + if right: + rparen = stringPict(vobj(right, h), baseline=b) + res = stringPict(*res.right(rparen)) + + return ('\n'.join(res.picture), res.baseline) + + def leftslash(self): + """Precede object by a slash of the proper size. + """ + # XXX not used anywhere ? + height = max( + self.baseline, + self.height() - 1 - self.baseline)*2 + 1 + slash = '\n'.join( + ' '*(height - i - 1) + xobj('/', 1) + ' '*i + for i in range(height) + ) + return self.left(stringPict(slash, height//2)) + + def root(self, n=None): + """Produce a nice root symbol. + Produces ugly results for big n inserts. + """ + # XXX not used anywhere + # XXX duplicate of root drawing in pretty.py + #put line over expression + result = self.above('_'*self.width()) + #construct right half of root symbol + height = self.height() + slash = '\n'.join( + ' ' * (height - i - 1) + '/' + ' ' * i + for i in range(height) + ) + slash = stringPict(slash, height - 1) + #left half of root symbol + if height > 2: + downline = stringPict('\\ \n \\', 1) + else: + downline = stringPict('\\') + #put n on top, as low as possible + if n is not None and n.width() > downline.width(): + downline = downline.left(' '*(n.width() - downline.width())) + downline = downline.above(n) + #build root symbol + root = downline.right(slash) + #glue it on at the proper height + #normally, the root symbel is as high as self + #which is one less than result + #this moves the root symbol one down + #if the root became higher, the baseline has to grow too + root.baseline = result.baseline - result.height() + root.height() + return result.left(root) + + def render(self, * args, **kwargs): + """Return the string form of self. + + Unless the argument line_break is set to False, it will + break the expression in a form that can be printed + on the terminal without being broken up. + """ + if _GLOBAL_WRAP_LINE is not None: + kwargs["wrap_line"] = _GLOBAL_WRAP_LINE + + if kwargs["wrap_line"] is False: + return "\n".join(self.picture) + + if kwargs["num_columns"] is not None: + # Read the argument num_columns if it is not None + ncols = kwargs["num_columns"] + else: + # Attempt to get a terminal width + ncols = self.terminal_width() + + if ncols <= 0: + ncols = 80 + + # If smaller than the terminal width, no need to correct + if self.width() <= ncols: + return type(self.picture[0])(self) + + """ + Break long-lines in a visually pleasing format. + without overflow indicators | with overflow indicators + | 2 2 3 | | 2 2 3 ↪| + |6*x *y + 4*x*y + | |6*x *y + 4*x*y + ↪| + | | | | + | 3 4 4 | |↪ 3 4 4 | + |4*y*x + x + y | |↪ 4*y*x + x + y | + |a*c*e + a*c*f + a*d | |a*c*e + a*c*f + a*d ↪| + |*e + a*d*f + b*c*e | | | + |+ b*c*f + b*d*e + b | |↪ *e + a*d*f + b*c* ↪| + |*d*f | | | + | | |↪ e + b*c*f + b*d*e ↪| + | | | | + | | |↪ + b*d*f | + """ + + overflow_first = "" + if kwargs["use_unicode"] or pretty_use_unicode(): + overflow_start = "\N{RIGHTWARDS ARROW WITH HOOK} " + overflow_end = " \N{RIGHTWARDS ARROW WITH HOOK}" + else: + overflow_start = "> " + overflow_end = " >" + + def chunks(line): + """Yields consecutive chunks of line_width ncols""" + prefix = overflow_first + width, start = line_width(prefix + overflow_end), 0 + for i, x in enumerate(line): + wx = line_width(x) + # Only flush the screen when the current character overflows. + # This way, combining marks can be appended even when width == ncols. + if width + wx > ncols: + yield prefix + line[start:i] + overflow_end + prefix = overflow_start + width, start = line_width(prefix + overflow_end), i + width += wx + yield prefix + line[start:] + + # Concurrently assemble chunks of all lines into individual screens + pictures = zip(*map(chunks, self.picture)) + + # Join lines of each screen into sub-pictures + pictures = ["\n".join(picture) for picture in pictures] + + # Add spacers between sub-pictures + return "\n\n".join(pictures) + + def terminal_width(self): + """Return the terminal width if possible, otherwise return 0. + """ + size = shutil.get_terminal_size(fallback=(0, 0)) + return size.columns + + def __eq__(self, o): + if isinstance(o, str): + return '\n'.join(self.picture) == o + elif isinstance(o, stringPict): + return o.picture == self.picture + return False + + def __hash__(self): + return super().__hash__() + + def __str__(self): + return '\n'.join(self.picture) + + def __repr__(self): + return "stringPict(%r,%d)" % ('\n'.join(self.picture), self.baseline) + + def __getitem__(self, index): + return self.picture[index] + + def __len__(self): + return len(self.s) + + +class prettyForm(stringPict): + """ + Extension of the stringPict class that knows about basic math applications, + optimizing double minus signs. + + "Binding" is interpreted as follows:: + + ATOM this is an atom: never needs to be parenthesized + FUNC this is a function application: parenthesize if added (?) + DIV this is a division: make wider division if divided + POW this is a power: only parenthesize if exponent + MUL this is a multiplication: parenthesize if powered + ADD this is an addition: parenthesize if multiplied or powered + NEG this is a negative number: optimize if added, parenthesize if + multiplied or powered + OPEN this is an open object: parenthesize if added, multiplied, or + powered (example: Piecewise) + """ + ATOM, FUNC, DIV, POW, MUL, ADD, NEG, OPEN = range(8) + + def __init__(self, s, baseline=0, binding=0, unicode=None): + """Initialize from stringPict and binding power.""" + stringPict.__init__(self, s, baseline) + self.binding = binding + if unicode is not None: + sympy_deprecation_warning( + """ + The unicode argument to prettyForm is deprecated. Only the s + argument (the first positional argument) should be passed. + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-pretty-printing-functions") + self._unicode = unicode or s + + @property + def unicode(self): + sympy_deprecation_warning( + """ + The prettyForm.unicode attribute is deprecated. Use the + prettyForm.s attribute instead. + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-pretty-printing-functions") + return self._unicode + + # Note: code to handle subtraction is in _print_Add + + def __add__(self, *others): + """Make a pretty addition. + Addition of negative numbers is simplified. + """ + arg = self + if arg.binding > prettyForm.NEG: + arg = stringPict(*arg.parens()) + result = [arg] + for arg in others: + #add parentheses for weak binders + if arg.binding > prettyForm.NEG: + arg = stringPict(*arg.parens()) + #use existing minus sign if available + if arg.binding != prettyForm.NEG: + result.append(' + ') + result.append(arg) + return prettyForm(binding=prettyForm.ADD, *stringPict.next(*result)) + + def __truediv__(self, den, slashed=False): + """Make a pretty division; stacked or slashed. + """ + if slashed: + raise NotImplementedError("Can't do slashed fraction yet") + num = self + if num.binding == prettyForm.DIV: + num = stringPict(*num.parens()) + if den.binding == prettyForm.DIV: + den = stringPict(*den.parens()) + + if num.binding==prettyForm.NEG: + num = num.right(" ")[0] + + return prettyForm(binding=prettyForm.DIV, *stringPict.stack( + num, + stringPict.LINE, + den)) + + def __mul__(self, *others): + """Make a pretty multiplication. + Parentheses are needed around +, - and neg. + """ + quantity = { + 'degree': "\N{DEGREE SIGN}" + } + + if len(others) == 0: + return self # We aren't actually multiplying... So nothing to do here. + + # add parens on args that need them + arg = self + if arg.binding > prettyForm.MUL and arg.binding != prettyForm.NEG: + arg = stringPict(*arg.parens()) + result = [arg] + for arg in others: + if arg.picture[0] not in quantity.values(): + result.append(xsym('*')) + #add parentheses for weak binders + if arg.binding > prettyForm.MUL and arg.binding != prettyForm.NEG: + arg = stringPict(*arg.parens()) + result.append(arg) + + len_res = len(result) + for i in range(len_res): + if i < len_res - 1 and result[i] == '-1' and result[i + 1] == xsym('*'): + # substitute -1 by -, like in -1*x -> -x + result.pop(i) + result.pop(i) + result.insert(i, '-') + if result[0][0] == '-': + # if there is a - sign in front of all + # This test was failing to catch a prettyForm.__mul__(prettyForm("-1", 0, 6)) being negative + bin = prettyForm.NEG + if result[0] == '-': + right = result[1] + if right.picture[right.baseline][0] == '-': + result[0] = '- ' + else: + bin = prettyForm.MUL + return prettyForm(binding=bin, *stringPict.next(*result)) + + def __repr__(self): + return "prettyForm(%r,%d,%d)" % ( + '\n'.join(self.picture), + self.baseline, + self.binding) + + def __pow__(self, b): + """Make a pretty power. + """ + a = self + use_inline_func_form = False + if b.binding == prettyForm.POW: + b = stringPict(*b.parens()) + if a.binding > prettyForm.FUNC: + a = stringPict(*a.parens()) + elif a.binding == prettyForm.FUNC: + # heuristic for when to use inline power + if b.height() > 1: + a = stringPict(*a.parens()) + else: + use_inline_func_form = True + + if use_inline_func_form: + # 2 + # sin + + (x) + b.baseline = a.prettyFunc.baseline + b.height() + func = stringPict(*a.prettyFunc.right(b)) + return prettyForm(*func.right(a.prettyArgs)) + else: + # 2 <-- top + # (x+y) <-- bot + top = stringPict(*b.left(' '*a.width())) + bot = stringPict(*a.right(' '*b.width())) + + return prettyForm(binding=prettyForm.POW, *bot.above(top)) + + simpleFunctions = ["sin", "cos", "tan"] + + @staticmethod + def apply(function, *args): + """Functions of one or more variables. + """ + if function in prettyForm.simpleFunctions: + #simple function: use only space if possible + assert len( + args) == 1, "Simple function %s must have 1 argument" % function + arg = args[0].__pretty__() + if arg.binding <= prettyForm.DIV: + #optimization: no parentheses necessary + return prettyForm(binding=prettyForm.FUNC, *arg.left(function + ' ')) + argumentList = [] + for arg in args: + argumentList.append(',') + argumentList.append(arg.__pretty__()) + argumentList = stringPict(*stringPict.next(*argumentList[1:])) + argumentList = stringPict(*argumentList.parens()) + return prettyForm(binding=prettyForm.ATOM, *argumentList.left(function)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/tests/test_pretty.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/tests/test_pretty.py new file mode 100644 index 0000000000000000000000000000000000000000..1cca79bd1dc5c3ba81483c8fe2e87c35926d1b94 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pretty/tests/test_pretty.py @@ -0,0 +1,7972 @@ +# -*- coding: utf-8 -*- +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.function import (Derivative, Function, Lambda, Subs) +from sympy.core.mul import Mul +from sympy.core import (EulerGamma, GoldenRatio, Catalan) +from sympy.core.numbers import (I, Rational, oo, pi) +from sympy.core.power import Pow +from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import conjugate +from sympy.functions.elementary.exponential import LambertW +from sympy.functions.special.bessel import (airyai, airyaiprime, airybi, airybiprime) +from sympy.functions.special.delta_functions import Heaviside +from sympy.functions.special.error_functions import (fresnelc, fresnels) +from sympy.functions.special.singularity_functions import SingularityFunction +from sympy.functions.special.zeta_functions import dirichlet_eta +from sympy.geometry.line import (Ray, Segment) +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (And, Equivalent, ITE, Implies, Nand, Nor, Not, Or, Xor) +from sympy.matrices.dense import (Matrix, diag) +from sympy.matrices.expressions.slice import MatrixSlice +from sympy.matrices.expressions.trace import Trace +from sympy.polys.domains.finitefield import FF +from sympy.polys.domains.integerring import ZZ +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.domains.realfield import RR +from sympy.polys.orderings import (grlex, ilex) +from sympy.polys.polytools import groebner +from sympy.polys.rootoftools import (RootSum, rootof) +from sympy.series.formal import fps +from sympy.series.fourier import fourier_series +from sympy.series.limits import Limit +from sympy.series.order import O +from sympy.series.sequences import (SeqAdd, SeqFormula, SeqMul, SeqPer) +from sympy.sets.contains import Contains +from sympy.sets.fancysets import Range +from sympy.sets.sets import (Complement, FiniteSet, Intersection, Interval, Union) +from sympy.codegen.ast import (Assignment, AddAugmentedAssignment, + SubAugmentedAssignment, MulAugmentedAssignment, DivAugmentedAssignment, ModAugmentedAssignment) +from sympy.core.expr import UnevaluatedExpr +from sympy.physics.quantum.trace import Tr + +from sympy.functions import (Abs, Chi, Ci, Ei, KroneckerDelta, + Piecewise, Shi, Si, atan2, beta, binomial, catalan, ceiling, cos, + euler, exp, expint, factorial, factorial2, floor, gamma, hyper, log, + meijerg, sin, sqrt, subfactorial, tan, uppergamma, lerchphi, polylog, + elliptic_k, elliptic_f, elliptic_e, elliptic_pi, DiracDelta, bell, + bernoulli, fibonacci, tribonacci, lucas, stieltjes, mathieuc, mathieus, + mathieusprime, mathieucprime) + +from sympy.matrices import (Adjoint, Inverse, MatrixSymbol, Transpose, + KroneckerProduct, BlockMatrix, OneMatrix, ZeroMatrix) +from sympy.matrices.expressions import hadamard_power + +from sympy.physics import mechanics +from sympy.physics.control.lti import (TransferFunction, Feedback, TransferFunctionMatrix, + Series, Parallel, MIMOSeries, MIMOParallel, MIMOFeedback, StateSpace) +from sympy.physics.units import joule, degree +from sympy.printing.pretty import pprint, pretty as xpretty +from sympy.printing.pretty.pretty_symbology import center_accent, is_combining, center +from sympy.sets.conditionset import ConditionSet + +from sympy.sets import ImageSet, ProductSet +from sympy.sets.setexpr import SetExpr +from sympy.stats.crv_types import Normal +from sympy.stats.symbolic_probability import (Covariance, Expectation, + Probability, Variance) +from sympy.tensor.array import (ImmutableDenseNDimArray, ImmutableSparseNDimArray, + MutableDenseNDimArray, MutableSparseNDimArray, tensorproduct) +from sympy.tensor.functions import TensorProduct +from sympy.tensor.tensor import (TensorIndexType, tensor_indices, TensorHead, + TensorElement, tensor_heads) + +from sympy.testing.pytest import raises, _both_exp_pow, warns_deprecated_sympy + +from sympy.vector import CoordSys3D, Gradient, Curl, Divergence, Dot, Cross, Laplacian + + + +import sympy as sym +class lowergamma(sym.lowergamma): + pass # testing notation inheritance by a subclass with same name + +a, b, c, d, x, y, z, k, n, s, p = symbols('a,b,c,d,x,y,z,k,n,s,p') +f = Function("f") +th = Symbol('theta') +ph = Symbol('phi') + +""" +Expressions whose pretty-printing is tested here: +(A '#' to the right of an expression indicates that its various acceptable +orderings are accounted for by the tests.) + + +BASIC EXPRESSIONS: + +oo +(x**2) +1/x +y*x**-2 +x**Rational(-5,2) +(-2)**x +Pow(3, 1, evaluate=False) +(x**2 + x + 1) # +1-x # +1-2*x # +x/y +-x/y +(x+2)/y # +(1+x)*y #3 +-5*x/(x+10) # correct placement of negative sign +1 - Rational(3,2)*(x+1) +-(-x + 5)*(-x - 2*sqrt(2) + 5) - (-y + 5)*(-y + 5) # issue 5524 + + +ORDERING: + +x**2 + x + 1 +1 - x +1 - 2*x +2*x**4 + y**2 - x**2 + y**3 + + +RELATIONAL: + +Eq(x, y) +Lt(x, y) +Gt(x, y) +Le(x, y) +Ge(x, y) +Ne(x/(y+1), y**2) # + + +RATIONAL NUMBERS: + +y*x**-2 +y**Rational(3,2) * x**Rational(-5,2) +sin(x)**3/tan(x)**2 + + +FUNCTIONS (ABS, CONJ, EXP, FUNCTION BRACES, FACTORIAL, FLOOR, CEILING): + +(2*x + exp(x)) # +Abs(x) +Abs(x/(x**2+1)) # +Abs(1 / (y - Abs(x))) +factorial(n) +factorial(2*n) +subfactorial(n) +subfactorial(2*n) +factorial(factorial(factorial(n))) +factorial(n+1) # +conjugate(x) +conjugate(f(x+1)) # +f(x) +f(x, y) +f(x/(y+1), y) # +f(x**x**x**x**x**x) +sin(x)**2 +conjugate(a+b*I) +conjugate(exp(a+b*I)) +conjugate( f(1 + conjugate(f(x))) ) # +f(x/(y+1), y) # denom of first arg +floor(1 / (y - floor(x))) +ceiling(1 / (y - ceiling(x))) + + +SQRT: + +sqrt(2) +2**Rational(1,3) +2**Rational(1,1000) +sqrt(x**2 + 1) +(1 + sqrt(5))**Rational(1,3) +2**(1/x) +sqrt(2+pi) +(2+(1+x**2)/(2+x))**Rational(1,4)+(1+x**Rational(1,1000))/sqrt(3+x**2) + + +DERIVATIVES: + +Derivative(log(x), x, evaluate=False) +Derivative(log(x), x, evaluate=False) + x # +Derivative(log(x) + x**2, x, y, evaluate=False) +Derivative(2*x*y, y, x, evaluate=False) + x**2 # +beta(alpha).diff(alpha) + + +INTEGRALS: + +Integral(log(x), x) +Integral(x**2, x) +Integral((sin(x))**2 / (tan(x))**2) +Integral(x**(2**x), x) +Integral(x**2, (x,1,2)) +Integral(x**2, (x,Rational(1,2),10)) +Integral(x**2*y**2, x,y) +Integral(x**2, (x, None, 1)) +Integral(x**2, (x, 1, None)) +Integral(sin(th)/cos(ph), (th,0,pi), (ph, 0, 2*pi)) + + +MATRICES: + +Matrix([[x**2+1, 1], [y, x+y]]) # +Matrix([[x/y, y, th], [0, exp(I*k*ph), 1]]) + + +PIECEWISE: + +Piecewise((x,x<1),(x**2,True)) + +ITE: + +ITE(x, y, z) + +SEQUENCES (TUPLES, LISTS, DICTIONARIES): + +() +[] +{} +(1/x,) +[x**2, 1/x, x, y, sin(th)**2/cos(ph)**2] +(x**2, 1/x, x, y, sin(th)**2/cos(ph)**2) +{x: sin(x)} +{1/x: 1/y, x: sin(x)**2} # +[x**2] +(x**2,) +{x**2: 1} + + +LIMITS: + +Limit(x, x, oo) +Limit(x**2, x, 0) +Limit(1/x, x, 0) +Limit(sin(x)/x, x, 0) + + +UNITS: + +joule => kg*m**2/s + + +SUBS: + +Subs(f(x), x, ph**2) +Subs(f(x).diff(x), x, 0) +Subs(f(x).diff(x)/y, (x, y), (0, Rational(1, 2))) + + +ORDER: + +O(1) +O(1/x) +O(x**2 + y**2) + +""" + + +def pretty(expr, order=None): + """ASCII pretty-printing""" + return xpretty(expr, order=order, use_unicode=False, wrap_line=False) + + +def upretty(expr, order=None): + """Unicode pretty-printing""" + return xpretty(expr, order=order, use_unicode=True, wrap_line=False) + + +def test_pretty_ascii_str(): + assert pretty( 'xxx' ) == 'xxx' + assert pretty( "xxx" ) == 'xxx' + assert pretty( 'xxx\'xxx' ) == 'xxx\'xxx' + assert pretty( 'xxx"xxx' ) == 'xxx\"xxx' + assert pretty( 'xxx\"xxx' ) == 'xxx\"xxx' + assert pretty( "xxx'xxx" ) == 'xxx\'xxx' + assert pretty( "xxx\'xxx" ) == 'xxx\'xxx' + assert pretty( "xxx\"xxx" ) == 'xxx\"xxx' + assert pretty( "xxx\"xxx\'xxx" ) == 'xxx"xxx\'xxx' + assert pretty( "xxx\nxxx" ) == 'xxx\nxxx' + + +def test_pretty_unicode_str(): + assert pretty( 'xxx' ) == 'xxx' + assert pretty( 'xxx' ) == 'xxx' + assert pretty( 'xxx\'xxx' ) == 'xxx\'xxx' + assert pretty( 'xxx"xxx' ) == 'xxx\"xxx' + assert pretty( 'xxx\"xxx' ) == 'xxx\"xxx' + assert pretty( "xxx'xxx" ) == 'xxx\'xxx' + assert pretty( "xxx\'xxx" ) == 'xxx\'xxx' + assert pretty( "xxx\"xxx" ) == 'xxx\"xxx' + assert pretty( "xxx\"xxx\'xxx" ) == 'xxx"xxx\'xxx' + assert pretty( "xxx\nxxx" ) == 'xxx\nxxx' + + +def test_upretty_greek(): + assert upretty( oo ) == '∞' + assert upretty( Symbol('alpha^+_1') ) == 'α⁺₁' + assert upretty( Symbol('beta') ) == 'β' + assert upretty(Symbol('lambda')) == 'λ' + + +def test_upretty_multiindex(): + assert upretty( Symbol('beta12') ) == 'β₁₂' + assert upretty( Symbol('Y00') ) == 'Y₀₀' + assert upretty( Symbol('Y_00') ) == 'Y₀₀' + assert upretty( Symbol('F^+-') ) == 'F⁺⁻' + + +def test_upretty_sub_super(): + assert upretty( Symbol('beta_1_2') ) == 'β₁ ₂' + assert upretty( Symbol('beta^1^2') ) == 'β¹ ²' + assert upretty( Symbol('beta_1^2') ) == 'β²₁' + assert upretty( Symbol('beta_10_20') ) == 'β₁₀ ₂₀' + assert upretty( Symbol('beta_ax_gamma^i') ) == 'βⁱₐₓ ᵧ' + assert upretty( Symbol("F^1^2_3_4") ) == 'F¹ ²₃ ₄' + assert upretty( Symbol("F_1_2^3^4") ) == 'F³ ⁴₁ ₂' + assert upretty( Symbol("F_1_2_3_4") ) == 'F₁ ₂ ₃ ₄' + assert upretty( Symbol("F^1^2^3^4") ) == 'F¹ ² ³ ⁴' + + +def test_upretty_subs_missing_in_24(): + assert upretty( Symbol('F_beta') ) == 'Fᵦ' + assert upretty( Symbol('F_gamma') ) == 'Fᵧ' + assert upretty( Symbol('F_rho') ) == 'Fᵨ' + assert upretty( Symbol('F_phi') ) == 'Fᵩ' + assert upretty( Symbol('F_chi') ) == 'Fᵪ' + + assert upretty( Symbol('F_a') ) == 'Fₐ' + assert upretty( Symbol('F_e') ) == 'Fₑ' + assert upretty( Symbol('F_i') ) == 'Fᵢ' + assert upretty( Symbol('F_o') ) == 'Fₒ' + assert upretty( Symbol('F_u') ) == 'Fᵤ' + assert upretty( Symbol('F_r') ) == 'Fᵣ' + assert upretty( Symbol('F_v') ) == 'Fᵥ' + assert upretty( Symbol('F_x') ) == 'Fₓ' + + +def test_missing_in_2X_issue_9047(): + assert upretty( Symbol('F_h') ) == 'Fₕ' + assert upretty( Symbol('F_k') ) == 'Fₖ' + assert upretty( Symbol('F_l') ) == 'Fₗ' + assert upretty( Symbol('F_m') ) == 'Fₘ' + assert upretty( Symbol('F_n') ) == 'Fₙ' + assert upretty( Symbol('F_p') ) == 'Fₚ' + assert upretty( Symbol('F_s') ) == 'Fₛ' + assert upretty( Symbol('F_t') ) == 'Fₜ' + + +def test_upretty_modifiers(): + # Accents + assert upretty( Symbol('Fmathring') ) == 'F̊' + assert upretty( Symbol('Fddddot') ) == 'F⃜' + assert upretty( Symbol('Fdddot') ) == 'F⃛' + assert upretty( Symbol('Fddot') ) == 'F̈' + assert upretty( Symbol('Fdot') ) == 'Ḟ' + assert upretty( Symbol('Fcheck') ) == 'F̌' + assert upretty( Symbol('Fbreve') ) == 'F̆' + assert upretty( Symbol('Facute') ) == 'F́' + assert upretty( Symbol('Fgrave') ) == 'F̀' + assert upretty( Symbol('Ftilde') ) == 'F̃' + assert upretty( Symbol('Fhat') ) == 'F̂' + assert upretty( Symbol('Fbar') ) == 'F̅' + assert upretty( Symbol('Fvec') ) == 'F⃗' + assert upretty( Symbol('Fprime') ) == 'F′' + assert upretty( Symbol('Fprm') ) == 'F′' + # No faces are actually implemented, but test to make sure the modifiers are stripped + assert upretty( Symbol('Fbold') ) == 'Fbold' + assert upretty( Symbol('Fbm') ) == 'Fbm' + assert upretty( Symbol('Fcal') ) == 'Fcal' + assert upretty( Symbol('Fscr') ) == 'Fscr' + assert upretty( Symbol('Ffrak') ) == 'Ffrak' + # Brackets + assert upretty( Symbol('Fnorm') ) == '‖F‖' + assert upretty( Symbol('Favg') ) == '⟨F⟩' + assert upretty( Symbol('Fabs') ) == '|F|' + assert upretty( Symbol('Fmag') ) == '|F|' + # Combinations + assert upretty( Symbol('xvecdot') ) == 'x⃗̇' + assert upretty( Symbol('xDotVec') ) == 'ẋ⃗' + assert upretty( Symbol('xHATNorm') ) == '‖x̂‖' + assert upretty( Symbol('xMathring_yCheckPRM__zbreveAbs') ) == 'x̊_y̌′__|z̆|' + assert upretty( Symbol('alphadothat_nVECDOT__tTildePrime') ) == 'α̇̂_n⃗̇__t̃′' + assert upretty( Symbol('x_dot') ) == 'x_dot' + assert upretty( Symbol('x__dot') ) == 'x__dot' + + +def test_pretty_Cycle(): + from sympy.combinatorics.permutations import Cycle + assert pretty(Cycle(1, 2)) == '(1 2)' + assert pretty(Cycle(2)) == '(2)' + assert pretty(Cycle(1, 3)(4, 5)) == '(1 3)(4 5)' + assert pretty(Cycle()) == '()' + + +def test_pretty_Permutation(): + from sympy.combinatorics.permutations import Permutation + p1 = Permutation(1, 2)(3, 4) + assert xpretty(p1, perm_cyclic=True, use_unicode=True) == "(1 2)(3 4)" + assert xpretty(p1, perm_cyclic=True, use_unicode=False) == "(1 2)(3 4)" + assert xpretty(p1, perm_cyclic=False, use_unicode=True) == \ + '⎛0 1 2 3 4⎞\n'\ + '⎝0 2 1 4 3⎠' + assert xpretty(p1, perm_cyclic=False, use_unicode=False) == \ + "/0 1 2 3 4\\\n"\ + "\\0 2 1 4 3/" + + with warns_deprecated_sympy(): + old_print_cyclic = Permutation.print_cyclic + Permutation.print_cyclic = False + assert xpretty(p1, use_unicode=True) == \ + '⎛0 1 2 3 4⎞\n'\ + '⎝0 2 1 4 3⎠' + assert xpretty(p1, use_unicode=False) == \ + "/0 1 2 3 4\\\n"\ + "\\0 2 1 4 3/" + Permutation.print_cyclic = old_print_cyclic + + +def test_pretty_basic(): + assert pretty( -Rational(1)/2 ) == '-1/2' + assert pretty( -Rational(13)/22 ) == \ +"""\ +-13 \n\ +----\n\ + 22 \ +""" + expr = oo + ascii_str = \ +"""\ +oo\ +""" + ucode_str = \ +"""\ +∞\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (x**2) + ascii_str = \ +"""\ + 2\n\ +x \ +""" + ucode_str = \ +"""\ + 2\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 1/x + ascii_str = \ +"""\ +1\n\ +-\n\ +x\ +""" + ucode_str = \ +"""\ +1\n\ +─\n\ +x\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + # not the same as 1/x + expr = x**-1.0 + ascii_str = \ +"""\ + -1.0\n\ +x \ +""" + ucode_str = \ +"""\ + -1.0\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + # see issue #2860 + expr = Pow(S(2), -1.0, evaluate=False) + ascii_str = \ +"""\ + -1.0\n\ +2 \ +""" + ucode_str = \ +"""\ + -1.0\n\ +2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = y*x**-2 + ascii_str = \ +"""\ +y \n\ +--\n\ + 2\n\ +x \ +""" + ucode_str = \ +"""\ +y \n\ +──\n\ + 2\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + #see issue #14033 + expr = x**Rational(1, 3) + ascii_str = \ +"""\ + 1/3\n\ +x \ +""" + ucode_str = \ +"""\ + 1/3\n\ +x \ +""" + assert xpretty(expr, use_unicode=False, wrap_line=False,\ + root_notation = False) == ascii_str + assert xpretty(expr, use_unicode=True, wrap_line=False,\ + root_notation = False) == ucode_str + + expr = x**Rational(-5, 2) + ascii_str = \ +"""\ + 1 \n\ +----\n\ + 5/2\n\ +x \ +""" + ucode_str = \ +"""\ + 1 \n\ +────\n\ + 5/2\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (-2)**x + ascii_str = \ +"""\ + x\n\ +(-2) \ +""" + ucode_str = \ +"""\ + x\n\ +(-2) \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + # See issue 4923 + expr = Pow(3, 1, evaluate=False) + ascii_str = \ +"""\ + 1\n\ +3 \ +""" + ucode_str = \ +"""\ + 1\n\ +3 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (x**2 + x + 1) + ascii_str_1 = \ +"""\ + 2\n\ +1 + x + x \ +""" + ascii_str_2 = \ +"""\ + 2 \n\ +x + x + 1\ +""" + ascii_str_3 = \ +"""\ + 2 \n\ +x + 1 + x\ +""" + ucode_str_1 = \ +"""\ + 2\n\ +1 + x + x \ +""" + ucode_str_2 = \ +"""\ + 2 \n\ +x + x + 1\ +""" + ucode_str_3 = \ +"""\ + 2 \n\ +x + 1 + x\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2, ascii_str_3] + assert upretty(expr) in [ucode_str_1, ucode_str_2, ucode_str_3] + + expr = 1 - x + ascii_str_1 = \ +"""\ +1 - x\ +""" + ascii_str_2 = \ +"""\ +-x + 1\ +""" + ucode_str_1 = \ +"""\ +1 - x\ +""" + ucode_str_2 = \ +"""\ +-x + 1\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = 1 - 2*x + ascii_str_1 = \ +"""\ +1 - 2*x\ +""" + ascii_str_2 = \ +"""\ +-2*x + 1\ +""" + ucode_str_1 = \ +"""\ +1 - 2⋅x\ +""" + ucode_str_2 = \ +"""\ +-2⋅x + 1\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = x/y + ascii_str = \ +"""\ +x\n\ +-\n\ +y\ +""" + ucode_str = \ +"""\ +x\n\ +─\n\ +y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = -x/y + ascii_str = \ +"""\ +-x \n\ +---\n\ + y \ +""" + ucode_str = \ +"""\ +-x \n\ +───\n\ + y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (x + 2)/y + ascii_str_1 = \ +"""\ +2 + x\n\ +-----\n\ + y \ +""" + ascii_str_2 = \ +"""\ +x + 2\n\ +-----\n\ + y \ +""" + ucode_str_1 = \ +"""\ +2 + x\n\ +─────\n\ + y \ +""" + ucode_str_2 = \ +"""\ +x + 2\n\ +─────\n\ + y \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = (1 + x)*y + ascii_str_1 = \ +"""\ +y*(1 + x)\ +""" + ascii_str_2 = \ +"""\ +(1 + x)*y\ +""" + ascii_str_3 = \ +"""\ +y*(x + 1)\ +""" + ucode_str_1 = \ +"""\ +y⋅(1 + x)\ +""" + ucode_str_2 = \ +"""\ +(1 + x)⋅y\ +""" + ucode_str_3 = \ +"""\ +y⋅(x + 1)\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2, ascii_str_3] + assert upretty(expr) in [ucode_str_1, ucode_str_2, ucode_str_3] + + # Test for correct placement of the negative sign + expr = -5*x/(x + 10) + ascii_str_1 = \ +"""\ +-5*x \n\ +------\n\ +10 + x\ +""" + ascii_str_2 = \ +"""\ +-5*x \n\ +------\n\ +x + 10\ +""" + ucode_str_1 = \ +"""\ +-5⋅x \n\ +──────\n\ +10 + x\ +""" + ucode_str_2 = \ +"""\ +-5⋅x \n\ +──────\n\ +x + 10\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = -S.Half - 3*x + ascii_str = \ +"""\ +-3*x - 1/2\ +""" + ucode_str = \ +"""\ +-3⋅x - 1/2\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = S.Half - 3*x + ascii_str = \ +"""\ +1/2 - 3*x\ +""" + ucode_str = \ +"""\ +1/2 - 3⋅x\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = -S.Half - 3*x/2 + ascii_str = \ +"""\ + 3*x 1\n\ +- --- - -\n\ + 2 2\ +""" + ucode_str = \ +"""\ + 3⋅x 1\n\ +- ─── - ─\n\ + 2 2\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = S.Half - 3*x/2 + ascii_str = \ +"""\ +1 3*x\n\ +- - ---\n\ +2 2 \ +""" + ucode_str = \ +"""\ +1 3⋅x\n\ +─ - ───\n\ +2 2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_negative_fractions(): + expr = -x/y + ascii_str =\ +"""\ +-x \n\ +---\n\ + y \ +""" + ucode_str =\ +"""\ +-x \n\ +───\n\ + y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -x*z/y + ascii_str =\ +"""\ +-x*z \n\ +-----\n\ + y \ +""" + ucode_str =\ +"""\ +-x⋅z \n\ +─────\n\ + y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = x**2/y + ascii_str =\ +"""\ + 2\n\ +x \n\ +--\n\ +y \ +""" + ucode_str =\ +"""\ + 2\n\ +x \n\ +──\n\ +y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -x**2/y + ascii_str =\ +"""\ + 2 \n\ +-x \n\ +----\n\ + y \ +""" + ucode_str =\ +"""\ + 2 \n\ +-x \n\ +────\n\ + y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -x/(y*z) + ascii_str =\ +"""\ +-x \n\ +---\n\ +y*z\ +""" + ucode_str =\ +"""\ +-x \n\ +───\n\ +y⋅z\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -a/y**2 + ascii_str =\ +"""\ +-a \n\ +---\n\ + 2 \n\ +y \ +""" + ucode_str =\ +"""\ +-a \n\ +───\n\ + 2 \n\ +y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = y**(-a/b) + ascii_str =\ +"""\ + -a \n\ + ---\n\ + b \n\ +y \ +""" + ucode_str =\ +"""\ + -a \n\ + ───\n\ + b \n\ +y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -1/y**2 + ascii_str =\ +"""\ +-1 \n\ +---\n\ + 2 \n\ +y \ +""" + ucode_str =\ +"""\ +-1 \n\ +───\n\ + 2 \n\ +y \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = -10/b**2 + ascii_str =\ +"""\ +-10 \n\ +----\n\ + 2 \n\ + b \ +""" + ucode_str =\ +"""\ +-10 \n\ +────\n\ + 2 \n\ + b \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + expr = Rational(-200, 37) + ascii_str =\ +"""\ +-200 \n\ +-----\n\ + 37 \ +""" + ucode_str =\ +"""\ +-200 \n\ +─────\n\ + 37 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_Mul(): + expr = Mul(0, 1, evaluate=False) + assert pretty(expr) == "0*1" + assert upretty(expr) == "0⋅1" + expr = Mul(1, 0, evaluate=False) + assert pretty(expr) == "1*0" + assert upretty(expr) == "1⋅0" + expr = Mul(1, 1, evaluate=False) + assert pretty(expr) == "1*1" + assert upretty(expr) == "1⋅1" + expr = Mul(1, 1, 1, evaluate=False) + assert pretty(expr) == "1*1*1" + assert upretty(expr) == "1⋅1⋅1" + expr = Mul(1, 2, evaluate=False) + assert pretty(expr) == "1*2" + assert upretty(expr) == "1⋅2" + expr = Add(0, 1, evaluate=False) + assert pretty(expr) == "0 + 1" + assert upretty(expr) == "0 + 1" + expr = Mul(1, 1, 2, evaluate=False) + assert pretty(expr) == "1*1*2" + assert upretty(expr) == "1⋅1⋅2" + expr = Add(0, 0, 1, evaluate=False) + assert pretty(expr) == "0 + 0 + 1" + assert upretty(expr) == "0 + 0 + 1" + expr = Mul(1, -1, evaluate=False) + assert pretty(expr) == "1*-1" + assert upretty(expr) == "1⋅-1" + expr = Mul(1.0, x, evaluate=False) + assert pretty(expr) == "1.0*x" + assert upretty(expr) == "1.0⋅x" + expr = Mul(1, 1, 2, 3, x, evaluate=False) + assert pretty(expr) == "1*1*2*3*x" + assert upretty(expr) == "1⋅1⋅2⋅3⋅x" + expr = Mul(-1, 1, evaluate=False) + assert pretty(expr) == "-1*1" + assert upretty(expr) == "-1⋅1" + expr = Mul(4, 3, 2, 1, 0, y, x, evaluate=False) + assert pretty(expr) == "4*3*2*1*0*y*x" + assert upretty(expr) == "4⋅3⋅2⋅1⋅0⋅y⋅x" + expr = Mul(4, 3, 2, 1+z, 0, y, x, evaluate=False) + assert pretty(expr) == "4*3*2*(z + 1)*0*y*x" + assert upretty(expr) == "4⋅3⋅2⋅(z + 1)⋅0⋅y⋅x" + expr = Mul(Rational(2, 3), Rational(5, 7), evaluate=False) + assert pretty(expr) == "2/3*5/7" + assert upretty(expr) == "2/3⋅5/7" + expr = Mul(x + y, Rational(1, 2), evaluate=False) + assert pretty(expr) == "(x + y)*1/2" + assert upretty(expr) == "(x + y)⋅1/2" + expr = Mul(Rational(1, 2), x + y, evaluate=False) + assert pretty(expr) == "x + y\n-----\n 2 " + assert upretty(expr) == "x + y\n─────\n 2 " + expr = Mul(S.One, x + y, evaluate=False) + assert pretty(expr) == "1*(x + y)" + assert upretty(expr) == "1⋅(x + y)" + expr = Mul(x - y, S.One, evaluate=False) + assert pretty(expr) == "(x - y)*1" + assert upretty(expr) == "(x - y)⋅1" + expr = Mul(Rational(1, 2), x - y, S.One, x + y, evaluate=False) + assert pretty(expr) == "1/2*(x - y)*1*(x + y)" + assert upretty(expr) == "1/2⋅(x - y)⋅1⋅(x + y)" + expr = Mul(x + y, Rational(3, 4), S.One, y - z, evaluate=False) + assert pretty(expr) == "(x + y)*3/4*1*(y - z)" + assert upretty(expr) == "(x + y)⋅3/4⋅1⋅(y - z)" + expr = Mul(x + y, Rational(1, 1), Rational(3, 4), Rational(5, 6),evaluate=False) + assert pretty(expr) == "(x + y)*1*3/4*5/6" + assert upretty(expr) == "(x + y)⋅1⋅3/4⋅5/6" + expr = Mul(Rational(3, 4), x + y, S.One, y - z, evaluate=False) + assert pretty(expr) == "3/4*(x + y)*1*(y - z)" + assert upretty(expr) == "3/4⋅(x + y)⋅1⋅(y - z)" + + +def test_issue_5524(): + assert pretty(-(-x + 5)*(-x - 2*sqrt(2) + 5) - (-y + 5)*(-y + 5)) == \ +"""\ + 2 / ___ \\\n\ +- (5 - y) + (x - 5)*\\-x - 2*\\/ 2 + 5/\ +""" + + assert upretty(-(-x + 5)*(-x - 2*sqrt(2) + 5) - (-y + 5)*(-y + 5)) == \ +"""\ + 2 \n\ +- (5 - y) + (x - 5)⋅(-x - 2⋅√2 + 5)\ +""" + + +def test_pretty_ordering(): + assert pretty(x**2 + x + 1, order='lex') == \ +"""\ + 2 \n\ +x + x + 1\ +""" + assert pretty(x**2 + x + 1, order='rev-lex') == \ +"""\ + 2\n\ +1 + x + x \ +""" + assert pretty(1 - x, order='lex') == '-x + 1' + assert pretty(1 - x, order='rev-lex') == '1 - x' + + assert pretty(1 - 2*x, order='lex') == '-2*x + 1' + assert pretty(1 - 2*x, order='rev-lex') == '1 - 2*x' + + f = 2*x**4 + y**2 - x**2 + y**3 + assert pretty(f, order=None) == \ +"""\ + 4 2 3 2\n\ +2*x - x + y + y \ +""" + assert pretty(f, order='lex') == \ +"""\ + 4 2 3 2\n\ +2*x - x + y + y \ +""" + assert pretty(f, order='rev-lex') == \ +"""\ + 2 3 2 4\n\ +y + y - x + 2*x \ +""" + + expr = x - x**3/6 + x**5/120 + O(x**6) + ascii_str = \ +"""\ + 3 5 \n\ + x x / 6\\\n\ +x - -- + --- + O\\x /\n\ + 6 120 \ +""" + ucode_str = \ +"""\ + 3 5 \n\ + x x ⎛ 6⎞\n\ +x - ── + ─── + O⎝x ⎠\n\ + 6 120 \ +""" + assert pretty(expr, order=None) == ascii_str + assert upretty(expr, order=None) == ucode_str + + assert pretty(expr, order='lex') == ascii_str + assert upretty(expr, order='lex') == ucode_str + + assert pretty(expr, order='rev-lex') == ascii_str + assert upretty(expr, order='rev-lex') == ucode_str + + +def test_EulerGamma(): + assert pretty(EulerGamma) == str(EulerGamma) == "EulerGamma" + assert upretty(EulerGamma) == "γ" + + +def test_GoldenRatio(): + assert pretty(GoldenRatio) == str(GoldenRatio) == "GoldenRatio" + assert upretty(GoldenRatio) == "φ" + + +def test_Catalan(): + assert pretty(Catalan) == upretty(Catalan) == "G" + + +def test_pretty_relational(): + expr = Eq(x, y) + ascii_str = \ +"""\ +x = y\ +""" + ucode_str = \ +"""\ +x = y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Lt(x, y) + ascii_str = \ +"""\ +x < y\ +""" + ucode_str = \ +"""\ +x < y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Gt(x, y) + ascii_str = \ +"""\ +x > y\ +""" + ucode_str = \ +"""\ +x > y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Le(x, y) + ascii_str = \ +"""\ +x <= y\ +""" + ucode_str = \ +"""\ +x ≤ y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Ge(x, y) + ascii_str = \ +"""\ +x >= y\ +""" + ucode_str = \ +"""\ +x ≥ y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Ne(x/(y + 1), y**2) + ascii_str_1 = \ +"""\ + x 2\n\ +----- != y \n\ +1 + y \ +""" + ascii_str_2 = \ +"""\ + x 2\n\ +----- != y \n\ +y + 1 \ +""" + ucode_str_1 = \ +"""\ + x 2\n\ +───── ≠ y \n\ +1 + y \ +""" + ucode_str_2 = \ +"""\ + x 2\n\ +───── ≠ y \n\ +y + 1 \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + +def test_Assignment(): + expr = Assignment(x, y) + ascii_str = \ +"""\ +x := y\ +""" + ucode_str = \ +"""\ +x := y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_AugmentedAssignment(): + expr = AddAugmentedAssignment(x, y) + ascii_str = \ +"""\ +x += y\ +""" + ucode_str = \ +"""\ +x += y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = SubAugmentedAssignment(x, y) + ascii_str = \ +"""\ +x -= y\ +""" + ucode_str = \ +"""\ +x -= y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = MulAugmentedAssignment(x, y) + ascii_str = \ +"""\ +x *= y\ +""" + ucode_str = \ +"""\ +x *= y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = DivAugmentedAssignment(x, y) + ascii_str = \ +"""\ +x /= y\ +""" + ucode_str = \ +"""\ +x /= y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = ModAugmentedAssignment(x, y) + ascii_str = \ +"""\ +x %= y\ +""" + ucode_str = \ +"""\ +x %= y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_rational(): + expr = y*x**-2 + ascii_str = \ +"""\ +y \n\ +--\n\ + 2\n\ +x \ +""" + ucode_str = \ +"""\ +y \n\ +──\n\ + 2\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = y**Rational(3, 2) * x**Rational(-5, 2) + ascii_str = \ +"""\ + 3/2\n\ +y \n\ +----\n\ + 5/2\n\ +x \ +""" + ucode_str = \ +"""\ + 3/2\n\ +y \n\ +────\n\ + 5/2\n\ +x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = sin(x)**3/tan(x)**2 + ascii_str = \ +"""\ + 3 \n\ +sin (x)\n\ +-------\n\ + 2 \n\ +tan (x)\ +""" + ucode_str = \ +"""\ + 3 \n\ +sin (x)\n\ +───────\n\ + 2 \n\ +tan (x)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +@_both_exp_pow +def test_pretty_functions(): + """Tests for Abs, conjugate, exp, function braces, and factorial.""" + expr = (2*x + exp(x)) + ascii_str_1 = \ +"""\ + x\n\ +2*x + e \ +""" + ascii_str_2 = \ +"""\ + x \n\ +e + 2*x\ +""" + ucode_str_1 = \ +"""\ + x\n\ +2⋅x + ℯ \ +""" + ucode_str_2 = \ +"""\ + x \n\ +ℯ + 2⋅x\ +""" + ucode_str_3 = \ +"""\ + x \n\ +ℯ + 2⋅x\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2, ucode_str_3] + + expr = Abs(x) + ascii_str = \ +"""\ +|x|\ +""" + ucode_str = \ +"""\ +│x│\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Abs(x/(x**2 + 1)) + ascii_str_1 = \ +"""\ +| x |\n\ +|------|\n\ +| 2|\n\ +|1 + x |\ +""" + ascii_str_2 = \ +"""\ +| x |\n\ +|------|\n\ +| 2 |\n\ +|x + 1|\ +""" + ucode_str_1 = \ +"""\ +│ x │\n\ +│──────│\n\ +│ 2│\n\ +│1 + x │\ +""" + ucode_str_2 = \ +"""\ +│ x │\n\ +│──────│\n\ +│ 2 │\n\ +│x + 1│\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = Abs(1 / (y - Abs(x))) + ascii_str = \ +"""\ + 1 \n\ +---------\n\ +|y - |x||\ +""" + ucode_str = \ +"""\ + 1 \n\ +─────────\n\ +│y - │x││\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + n = Symbol('n', integer=True) + expr = factorial(n) + ascii_str = \ +"""\ +n!\ +""" + ucode_str = \ +"""\ +n!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial(2*n) + ascii_str = \ +"""\ +(2*n)!\ +""" + ucode_str = \ +"""\ +(2⋅n)!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial(factorial(factorial(n))) + ascii_str = \ +"""\ +((n!)!)!\ +""" + ucode_str = \ +"""\ +((n!)!)!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial(n + 1) + ascii_str_1 = \ +"""\ +(1 + n)!\ +""" + ascii_str_2 = \ +"""\ +(n + 1)!\ +""" + ucode_str_1 = \ +"""\ +(1 + n)!\ +""" + ucode_str_2 = \ +"""\ +(n + 1)!\ +""" + + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = subfactorial(n) + ascii_str = \ +"""\ +!n\ +""" + ucode_str = \ +"""\ +!n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = subfactorial(2*n) + ascii_str = \ +"""\ +!(2*n)\ +""" + ucode_str = \ +"""\ +!(2⋅n)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + n = Symbol('n', integer=True) + expr = factorial2(n) + ascii_str = \ +"""\ +n!!\ +""" + ucode_str = \ +"""\ +n!!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial2(2*n) + ascii_str = \ +"""\ +(2*n)!!\ +""" + ucode_str = \ +"""\ +(2⋅n)!!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial2(factorial2(factorial2(n))) + ascii_str = \ +"""\ +((n!!)!!)!!\ +""" + ucode_str = \ +"""\ +((n!!)!!)!!\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = factorial2(n + 1) + ascii_str_1 = \ +"""\ +(1 + n)!!\ +""" + ascii_str_2 = \ +"""\ +(n + 1)!!\ +""" + ucode_str_1 = \ +"""\ +(1 + n)!!\ +""" + ucode_str_2 = \ +"""\ +(n + 1)!!\ +""" + + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = 2*binomial(n, k) + ascii_str = \ +"""\ + /n\\\n\ +2*| |\n\ + \\k/\ +""" + ucode_str = \ +"""\ + ⎛n⎞\n\ +2⋅⎜ ⎟\n\ + ⎝k⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2*binomial(2*n, k) + ascii_str = \ +"""\ + /2*n\\\n\ +2*| |\n\ + \\ k /\ +""" + ucode_str = \ +"""\ + ⎛2⋅n⎞\n\ +2⋅⎜ ⎟\n\ + ⎝ k ⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2*binomial(n**2, k) + ascii_str = \ +"""\ + / 2\\\n\ + |n |\n\ +2*| |\n\ + \\k /\ +""" + ucode_str = \ +"""\ + ⎛ 2⎞\n\ + ⎜n ⎟\n\ +2⋅⎜ ⎟\n\ + ⎝k ⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = catalan(n) + ascii_str = \ +"""\ +C \n\ + n\ +""" + ucode_str = \ +"""\ +C \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = catalan(n) + ascii_str = \ +"""\ +C \n\ + n\ +""" + ucode_str = \ +"""\ +C \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = bell(n) + ascii_str = \ +"""\ +B \n\ + n\ +""" + ucode_str = \ +"""\ +B \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = bernoulli(n) + ascii_str = \ +"""\ +B \n\ + n\ +""" + ucode_str = \ +"""\ +B \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = bernoulli(n, x) + ascii_str = \ +"""\ +B (x)\n\ + n \ +""" + ucode_str = \ +"""\ +B (x)\n\ + n \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = fibonacci(n) + ascii_str = \ +"""\ +F \n\ + n\ +""" + ucode_str = \ +"""\ +F \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = lucas(n) + ascii_str = \ +"""\ +L \n\ + n\ +""" + ucode_str = \ +"""\ +L \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = tribonacci(n) + ascii_str = \ +"""\ +T \n\ + n\ +""" + ucode_str = \ +"""\ +T \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = stieltjes(n) + ascii_str = \ +"""\ +stieltjes \n\ + n\ +""" + ucode_str = \ +"""\ +γ \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = stieltjes(n, x) + ascii_str = \ +"""\ +stieltjes (x)\n\ + n \ +""" + ucode_str = \ +"""\ +γ (x)\n\ + n \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = mathieuc(x, y, z) + ascii_str = 'C(x, y, z)' + ucode_str = 'C(x, y, z)' + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = mathieus(x, y, z) + ascii_str = 'S(x, y, z)' + ucode_str = 'S(x, y, z)' + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = mathieucprime(x, y, z) + ascii_str = "C'(x, y, z)" + ucode_str = "C'(x, y, z)" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = mathieusprime(x, y, z) + ascii_str = "S'(x, y, z)" + ucode_str = "S'(x, y, z)" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = conjugate(x) + ascii_str = \ +"""\ +_\n\ +x\ +""" + ucode_str = \ +"""\ +_\n\ +x\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + f = Function('f') + expr = conjugate(f(x + 1)) + ascii_str_1 = \ +"""\ +________\n\ +f(1 + x)\ +""" + ascii_str_2 = \ +"""\ +________\n\ +f(x + 1)\ +""" + ucode_str_1 = \ +"""\ +________\n\ +f(1 + x)\ +""" + ucode_str_2 = \ +"""\ +________\n\ +f(x + 1)\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = f(x) + ascii_str = \ +"""\ +f(x)\ +""" + ucode_str = \ +"""\ +f(x)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = f(x, y) + ascii_str = \ +"""\ +f(x, y)\ +""" + ucode_str = \ +"""\ +f(x, y)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = f(x/(y + 1), y) + ascii_str_1 = \ +"""\ + / x \\\n\ +f|-----, y|\n\ + \\1 + y /\ +""" + ascii_str_2 = \ +"""\ + / x \\\n\ +f|-----, y|\n\ + \\y + 1 /\ +""" + ucode_str_1 = \ +"""\ + ⎛ x ⎞\n\ +f⎜─────, y⎟\n\ + ⎝1 + y ⎠\ +""" + ucode_str_2 = \ +"""\ + ⎛ x ⎞\n\ +f⎜─────, y⎟\n\ + ⎝y + 1 ⎠\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = f(x**x**x**x**x**x) + ascii_str = \ +"""\ + / / / / / x\\\\\\\\\\ + | | | | \\x /|||| + | | | \\x /||| + | | \\x /|| + | \\x /| +f\\x /\ +""" + ucode_str = \ +"""\ + ⎛ ⎛ ⎛ ⎛ ⎛ x⎞⎞⎞⎞⎞ + ⎜ ⎜ ⎜ ⎜ ⎝x ⎠⎟⎟⎟⎟ + ⎜ ⎜ ⎜ ⎝x ⎠⎟⎟⎟ + ⎜ ⎜ ⎝x ⎠⎟⎟ + ⎜ ⎝x ⎠⎟ +f⎝x ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = sin(x)**2 + ascii_str = \ +"""\ + 2 \n\ +sin (x)\ +""" + ucode_str = \ +"""\ + 2 \n\ +sin (x)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = conjugate(a + b*I) + ascii_str = \ +"""\ +_ _\n\ +a - I*b\ +""" + ucode_str = \ +"""\ +_ _\n\ +a - ⅈ⋅b\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = conjugate(exp(a + b*I)) + ascii_str = \ +"""\ + _ _\n\ + a - I*b\n\ +e \ +""" + ucode_str = \ +"""\ + _ _\n\ + a - ⅈ⋅b\n\ +ℯ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = conjugate( f(1 + conjugate(f(x))) ) + ascii_str_1 = \ +"""\ +___________\n\ + / ____\\\n\ +f\\1 + f(x)/\ +""" + ascii_str_2 = \ +"""\ +___________\n\ + /____ \\\n\ +f\\f(x) + 1/\ +""" + ucode_str_1 = \ +"""\ +___________\n\ + ⎛ ____⎞\n\ +f⎝1 + f(x)⎠\ +""" + ucode_str_2 = \ +"""\ +___________\n\ + ⎛____ ⎞\n\ +f⎝f(x) + 1⎠\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = f(x/(y + 1), y) + ascii_str_1 = \ +"""\ + / x \\\n\ +f|-----, y|\n\ + \\1 + y /\ +""" + ascii_str_2 = \ +"""\ + / x \\\n\ +f|-----, y|\n\ + \\y + 1 /\ +""" + ucode_str_1 = \ +"""\ + ⎛ x ⎞\n\ +f⎜─────, y⎟\n\ + ⎝1 + y ⎠\ +""" + ucode_str_2 = \ +"""\ + ⎛ x ⎞\n\ +f⎜─────, y⎟\n\ + ⎝y + 1 ⎠\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = floor(1 / (y - floor(x))) + ascii_str = \ +"""\ + / 1 \\\n\ +floor|------------|\n\ + \\y - floor(x)/\ +""" + ucode_str = \ +"""\ +⎢ 1 ⎥\n\ +⎢───────⎥\n\ +⎣y - ⌊x⌋⎦\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = ceiling(1 / (y - ceiling(x))) + ascii_str = \ +"""\ + / 1 \\\n\ +ceiling|--------------|\n\ + \\y - ceiling(x)/\ +""" + ucode_str = \ +"""\ +⎡ 1 ⎤\n\ +⎢───────⎥\n\ +⎢y - ⌈x⌉⎥\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = euler(n) + ascii_str = \ +"""\ +E \n\ + n\ +""" + ucode_str = \ +"""\ +E \n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = euler(1/(1 + 1/(1 + 1/n))) + ascii_str = \ +"""\ +E \n\ + 1 \n\ + ---------\n\ + 1 \n\ + 1 + -----\n\ + 1\n\ + 1 + -\n\ + n\ +""" + + ucode_str = \ +"""\ +E \n\ + 1 \n\ + ─────────\n\ + 1 \n\ + 1 + ─────\n\ + 1\n\ + 1 + ─\n\ + n\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = euler(n, x) + ascii_str = \ +"""\ +E (x)\n\ + n \ +""" + ucode_str = \ +"""\ +E (x)\n\ + n \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = euler(n, x/2) + ascii_str = \ +"""\ + /x\\\n\ +E |-|\n\ + n\\2/\ +""" + ucode_str = \ +"""\ + ⎛x⎞\n\ +E ⎜─⎟\n\ + n⎝2⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_sqrt(): + expr = sqrt(2) + ascii_str = \ +"""\ + ___\n\ +\\/ 2 \ +""" + ucode_str = \ +"√2" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2**Rational(1, 3) + ascii_str = \ +"""\ +3 ___\n\ +\\/ 2 \ +""" + ucode_str = \ +"""\ +3 ___\n\ +╲╱ 2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2**Rational(1, 1000) + ascii_str = \ +"""\ +1000___\n\ + \\/ 2 \ +""" + ucode_str = \ +"""\ +1000___\n\ + ╲╱ 2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = sqrt(x**2 + 1) + ascii_str = \ +"""\ + ________\n\ + / 2 \n\ +\\/ x + 1 \ +""" + ucode_str = \ +"""\ + ________\n\ + ╱ 2 \n\ +╲╱ x + 1 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (1 + sqrt(5))**Rational(1, 3) + ascii_str = \ +"""\ + ___________\n\ +3 / ___ \n\ +\\/ 1 + \\/ 5 \ +""" + ucode_str = \ +"""\ +3 ________\n\ +╲╱ 1 + √5 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2**(1/x) + ascii_str = \ +"""\ +x ___\n\ +\\/ 2 \ +""" + ucode_str = \ +"""\ +x ___\n\ +╲╱ 2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = sqrt(2 + pi) + ascii_str = \ +"""\ + ________\n\ +\\/ 2 + pi \ +""" + ucode_str = \ +"""\ + _______\n\ +╲╱ 2 + π \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (2 + ( + 1 + x**2)/(2 + x))**Rational(1, 4) + (1 + x**Rational(1, 1000))/sqrt(3 + x**2) + ascii_str = \ +"""\ + ____________ \n\ + / 2 1000___ \n\ + / x + 1 \\/ x + 1\n\ +4 / 2 + ------ + -----------\n\ +\\/ x + 2 ________\n\ + / 2 \n\ + \\/ x + 3 \ +""" + ucode_str = \ +"""\ + ____________ \n\ + ╱ 2 1000___ \n\ + ╱ x + 1 ╲╱ x + 1\n\ +4 ╱ 2 + ────── + ───────────\n\ +╲╱ x + 2 ________\n\ + ╱ 2 \n\ + ╲╱ x + 3 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_sqrt_char_knob(): + # See PR #9234. + expr = sqrt(2) + ucode_str1 = \ +"""\ + ___\n\ +╲╱ 2 \ +""" + ucode_str2 = \ +"√2" + assert xpretty(expr, use_unicode=True, + use_unicode_sqrt_char=False) == ucode_str1 + assert xpretty(expr, use_unicode=True, + use_unicode_sqrt_char=True) == ucode_str2 + + +def test_pretty_sqrt_longsymbol_no_sqrt_char(): + # Do not use unicode sqrt char for long symbols (see PR #9234). + expr = sqrt(Symbol('C1')) + ucode_str = \ +"""\ + ____\n\ +╲╱ C₁ \ +""" + assert upretty(expr) == ucode_str + + +def test_pretty_KroneckerDelta(): + x, y = symbols("x, y") + expr = KroneckerDelta(x, y) + ascii_str = \ +"""\ +d \n\ + x,y\ +""" + ucode_str = \ +"""\ +δ \n\ + x,y\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_product(): + n, m, k, l = symbols('n m k l') + f = symbols('f', cls=Function) + expr = Product(f((n/3)**2), (n, k**2, l)) + + unicode_str = \ +"""\ + l \n\ +─┬──────┬─ \n\ + │ │ ⎛ 2⎞\n\ + │ │ ⎜n ⎟\n\ + │ │ f⎜──⎟\n\ + │ │ ⎝9 ⎠\n\ + │ │ \n\ + 2 \n\ + n = k """ + ascii_str = \ +"""\ + l \n\ +__________ \n\ + | | / 2\\\n\ + | | |n |\n\ + | | f|--|\n\ + | | \\9 /\n\ + | | \n\ + 2 \n\ + n = k """ + + expr = Product(f((n/3)**2), (n, k**2, l), (l, 1, m)) + + unicode_str = \ +"""\ + m l \n\ +─┬──────┬─ ─┬──────┬─ \n\ + │ │ │ │ ⎛ 2⎞\n\ + │ │ │ │ ⎜n ⎟\n\ + │ │ │ │ f⎜──⎟\n\ + │ │ │ │ ⎝9 ⎠\n\ + │ │ │ │ \n\ + l = 1 2 \n\ + n = k """ + ascii_str = \ +"""\ + m l \n\ +__________ __________ \n\ + | | | | / 2\\\n\ + | | | | |n |\n\ + | | | | f|--|\n\ + | | | | \\9 /\n\ + | | | | \n\ + l = 1 2 \n\ + n = k """ + + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + + +def test_pretty_Lambda(): + # S.IdentityFunction is a special case + expr = Lambda(y, y) + assert pretty(expr) == "x -> x" + assert upretty(expr) == "x ↦ x" + + expr = Lambda(x, x+1) + assert pretty(expr) == "x -> x + 1" + assert upretty(expr) == "x ↦ x + 1" + + expr = Lambda(x, x**2) + ascii_str = \ +"""\ + 2\n\ +x -> x \ +""" + ucode_str = \ +"""\ + 2\n\ +x ↦ x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Lambda(x, x**2)**2 + ascii_str = \ +"""\ + 2 +/ 2\\ \n\ +\\x -> x / \ +""" + ucode_str = \ +"""\ + 2 +⎛ 2⎞ \n\ +⎝x ↦ x ⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Lambda((x, y), x) + ascii_str = "(x, y) -> x" + ucode_str = "(x, y) ↦ x" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Lambda((x, y), x**2) + ascii_str = \ +"""\ + 2\n\ +(x, y) -> x \ +""" + ucode_str = \ +"""\ + 2\n\ +(x, y) ↦ x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Lambda(((x, y),), x**2) + ascii_str = \ +"""\ + 2\n\ +((x, y),) -> x \ +""" + ucode_str = \ +"""\ + 2\n\ +((x, y),) ↦ x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_TransferFunction(): + tf1 = TransferFunction(s - 1, s + 1, s) + assert upretty(tf1) == "s - 1\n─────\ns + 1" + tf2 = TransferFunction(2*s + 1, 3 - p, s) + assert upretty(tf2) == "2⋅s + 1\n───────\n 3 - p " + tf3 = TransferFunction(p, p + 1, p) + assert upretty(tf3) == " p \n─────\np + 1" + + +def test_pretty_Series(): + tf1 = TransferFunction(x + y, x - 2*y, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(x**2 + y, y - x, y) + tf4 = TransferFunction(2, 3, y) + + tfm1 = TransferFunctionMatrix([[tf1, tf2], [tf3, tf4]]) + tfm2 = TransferFunctionMatrix([[tf3], [-tf4]]) + tfm3 = TransferFunctionMatrix([[tf1, -tf2, -tf3], [tf3, -tf4, tf2]]) + tfm4 = TransferFunctionMatrix([[tf1, tf2], [tf3, -tf4], [-tf2, -tf1]]) + tfm5 = TransferFunctionMatrix([[-tf2, -tf1], [tf4, -tf3], [tf1, tf2]]) + + expected1 = \ +"""\ + ⎛ 2 ⎞\n\ +⎛ x + y ⎞ ⎜x + y⎟\n\ +⎜───────⎟⋅⎜──────⎟\n\ +⎝x - 2⋅y⎠ ⎝-x + y⎠\ +""" + expected2 = \ +"""\ +⎛-x + y⎞ ⎛-x - y ⎞\n\ +⎜──────⎟⋅⎜───────⎟\n\ +⎝x + y ⎠ ⎝x - 2⋅y⎠\ +""" + expected3 = \ +"""\ +⎛ 2 ⎞ \n\ +⎜x + y⎟ ⎛ x + y ⎞ ⎛-x - y x - y⎞\n\ +⎜──────⎟⋅⎜───────⎟⋅⎜─────── + ─────⎟\n\ +⎝-x + y⎠ ⎝x - 2⋅y⎠ ⎝x - 2⋅y x + y⎠\ +""" + expected4 = \ +"""\ + ⎛ 2 ⎞\n\ +⎛ x + y x - y⎞ ⎜x - y x + y⎟\n\ +⎜─────── + ─────⎟⋅⎜───── + ──────⎟\n\ +⎝x - 2⋅y x + y⎠ ⎝x + y -x + y⎠\ +""" + expected5 = \ +"""\ +⎡ x + y x - y⎤ ⎡ 2 ⎤ \n\ +⎢─────── ─────⎥ ⎢x + y⎥ \n\ +⎢x - 2⋅y x + y⎥ ⎢──────⎥ \n\ +⎢ ⎥ ⎢-x + y⎥ \n\ +⎢ 2 ⎥ ⋅⎢ ⎥ \n\ +⎢x + y 2 ⎥ ⎢ -2 ⎥ \n\ +⎢────── ─ ⎥ ⎢ ─── ⎥ \n\ +⎣-x + y 3 ⎦τ ⎣ 3 ⎦τ\ +""" + expected6 = \ +"""\ + ⎛⎡ x + y x - y ⎤ ⎡ x - y x + y ⎤ ⎞\n\ + ⎜⎢─────── ───── ⎥ ⎢ ───── ───────⎥ ⎟\n\ +⎡ x + y x - y⎤ ⎡ 2 ⎤ ⎜⎢x - 2⋅y x + y ⎥ ⎢ x + y x - 2⋅y⎥ ⎟\n\ +⎢─────── ─────⎥ ⎢ x + y -x + y - x - y⎥ ⎜⎢ ⎥ ⎢ ⎥ ⎟\n\ +⎢x - 2⋅y x + y⎥ ⎢─────── ────── ────────⎥ ⎜⎢ 2 ⎥ ⎢ 2 ⎥ ⎟\n\ +⎢ ⎥ ⎢x - 2⋅y x + y -x + y ⎥ ⎜⎢x + y -2 ⎥ ⎢ -2 x + y ⎥ ⎟\n\ +⎢ 2 ⎥ ⋅⎢ ⎥ ⋅⎜⎢────── ─── ⎥ + ⎢ ─── ────── ⎥ ⎟\n\ +⎢x + y 2 ⎥ ⎢ 2 ⎥ ⎜⎢-x + y 3 ⎥ ⎢ 3 -x + y ⎥ ⎟\n\ +⎢────── ─ ⎥ ⎢x + y -2 x - y ⎥ ⎜⎢ ⎥ ⎢ ⎥ ⎟\n\ +⎣-x + y 3 ⎦τ ⎢────── ─── ───── ⎥ ⎜⎢-x + y -x - y ⎥ ⎢-x - y -x + y ⎥ ⎟\n\ + ⎣-x + y 3 x + y ⎦τ ⎜⎢────── ───────⎥ ⎢─────── ────── ⎥ ⎟\n\ + ⎝⎣x + y x - 2⋅y⎦τ ⎣x - 2⋅y x + y ⎦τ⎠\ +""" + + assert upretty(Series(tf1, tf3)) == expected1 + assert upretty(Series(-tf2, -tf1)) == expected2 + assert upretty(Series(tf3, tf1, Parallel(-tf1, tf2))) == expected3 + assert upretty(Series(Parallel(tf1, tf2), Parallel(tf2, tf3))) == expected4 + assert upretty(MIMOSeries(tfm2, tfm1)) == expected5 + assert upretty(MIMOSeries(MIMOParallel(tfm4, -tfm5), tfm3, tfm1)) == expected6 + + +def test_pretty_Parallel(): + tf1 = TransferFunction(x + y, x - 2*y, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(x**2 + y, y - x, y) + tf4 = TransferFunction(y**2 - x, x**3 + x, y) + + tfm1 = TransferFunctionMatrix([[tf1, tf2], [tf3, -tf4], [-tf2, -tf1]]) + tfm2 = TransferFunctionMatrix([[-tf2, -tf1], [tf4, -tf3], [tf1, tf2]]) + tfm3 = TransferFunctionMatrix([[-tf1, tf2], [-tf3, tf4], [tf2, tf1]]) + tfm4 = TransferFunctionMatrix([[-tf1, -tf2], [-tf3, -tf4]]) + + expected1 = \ +"""\ + x + y x - y\n\ +─────── + ─────\n\ +x - 2⋅y x + y\ +""" + expected2 = \ +"""\ +-x + y -x - y \n\ +────── + ─────── +x + y x - 2⋅y\ +""" + expected3 = \ +"""\ + 2 \n\ +x + y x + y ⎛-x - y ⎞ ⎛x - y⎞ +────── + ─────── + ⎜───────⎟⋅⎜─────⎟ +-x + y x - 2⋅y ⎝x - 2⋅y⎠ ⎝x + y⎠\ +""" + + expected4 = \ +"""\ + ⎛ 2 ⎞\n\ +⎛ x + y ⎞ ⎛x - y⎞ ⎛x - y⎞ ⎜x + y⎟\n\ +⎜───────⎟⋅⎜─────⎟ + ⎜─────⎟⋅⎜──────⎟\n\ +⎝x - 2⋅y⎠ ⎝x + y⎠ ⎝x + y⎠ ⎝-x + y⎠\ +""" + expected5 = \ +"""\ +⎡ x + y -x + y ⎤ ⎡ x - y x + y ⎤ ⎡ x + y x - y ⎤ \n\ +⎢─────── ────── ⎥ ⎢ ───── ───────⎥ ⎢─────── ───── ⎥ \n\ +⎢x - 2⋅y x + y ⎥ ⎢ x + y x - 2⋅y⎥ ⎢x - 2⋅y x + y ⎥ \n\ +⎢ ⎥ ⎢ ⎥ ⎢ ⎥ \n\ +⎢ 2 2 ⎥ ⎢ 2 2 ⎥ ⎢ 2 2 ⎥ \n\ +⎢x + y x - y ⎥ ⎢x - y x + y ⎥ ⎢x + y x - y ⎥ \n\ +⎢────── ────── ⎥ + ⎢────── ────── ⎥ + ⎢────── ────── ⎥ \n\ +⎢-x + y 3 ⎥ ⎢ 3 -x + y ⎥ ⎢-x + y 3 ⎥ \n\ +⎢ x + x ⎥ ⎢x + x ⎥ ⎢ x + x ⎥ \n\ +⎢ ⎥ ⎢ ⎥ ⎢ ⎥ \n\ +⎢-x + y -x - y ⎥ ⎢-x - y -x + y ⎥ ⎢-x + y -x - y ⎥ \n\ +⎢────── ───────⎥ ⎢─────── ────── ⎥ ⎢────── ───────⎥ \n\ +⎣x + y x - 2⋅y⎦τ ⎣x - 2⋅y x + y ⎦τ ⎣x + y x - 2⋅y⎦τ\ +""" + expected6 = \ +"""\ +⎡ x - y x + y ⎤ ⎡-x + y -x - y ⎤ \n\ +⎢ ───── ───────⎥ ⎢────── ─────── ⎥ \n\ +⎢ x + y x - 2⋅y⎥ ⎡-x - y -x + y⎤ ⎢x + y x - 2⋅y ⎥ \n\ +⎢ ⎥ ⎢─────── ──────⎥ ⎢ ⎥ \n\ +⎢ 2 2 ⎥ ⎢x - 2⋅y x + y ⎥ ⎢ 2 2 ⎥ \n\ +⎢x - y x + y ⎥ ⎢ ⎥ ⎢-x + y - x - y⎥ \n\ +⎢────── ────── ⎥ ⋅⎢ 2 2⎥ + ⎢─────── ────────⎥ \n\ +⎢ 3 -x + y ⎥ ⎢- x - y x - y ⎥ ⎢ 3 -x + y ⎥ \n\ +⎢x + x ⎥ ⎢──────── ──────⎥ ⎢x + x ⎥ \n\ +⎢ ⎥ ⎢ -x + y 3 ⎥ ⎢ ⎥ \n\ +⎢-x - y -x + y ⎥ ⎣ x + x⎦τ ⎢ x + y x - y ⎥ \n\ +⎢─────── ────── ⎥ ⎢─────── ───── ⎥ \n\ +⎣x - 2⋅y x + y ⎦τ ⎣x - 2⋅y x + y ⎦τ\ +""" + assert upretty(Parallel(tf1, tf2)) == expected1 + assert upretty(Parallel(-tf2, -tf1)) == expected2 + assert upretty(Parallel(tf3, tf1, Series(-tf1, tf2))) == expected3 + assert upretty(Parallel(Series(tf1, tf2), Series(tf2, tf3))) == expected4 + assert upretty(MIMOParallel(-tfm3, -tfm2, tfm1)) == expected5 + assert upretty(MIMOParallel(MIMOSeries(tfm4, -tfm2), tfm2)) == expected6 + + +def test_pretty_Feedback(): + tf = TransferFunction(1, 1, y) + tf1 = TransferFunction(x + y, x - 2*y, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(y**2 - 2*y + 1, y + 5, y) + tf4 = TransferFunction(x - 2*y**3, x + y, x) + tf5 = TransferFunction(1 - x, x - y, y) + tf6 = TransferFunction(2, 2, x) + expected1 = \ +"""\ + ⎛1⎞ \n\ + ⎜─⎟ \n\ + ⎝1⎠ \n\ +─────────────\n\ +1 ⎛ x + y ⎞\n\ +─ + ⎜───────⎟\n\ +1 ⎝x - 2⋅y⎠\ +""" + expected2 = \ +"""\ + ⎛1⎞ \n\ + ⎜─⎟ \n\ + ⎝1⎠ \n\ +────────────────────────────────────\n\ + ⎛ 2 ⎞\n\ +1 ⎛x - y⎞ ⎛ x + y ⎞ ⎜y - 2⋅y + 1⎟\n\ +─ + ⎜─────⎟⋅⎜───────⎟⋅⎜────────────⎟\n\ +1 ⎝x + y⎠ ⎝x - 2⋅y⎠ ⎝ y + 5 ⎠\ +""" + expected3 = \ +"""\ + ⎛ x + y ⎞ \n\ + ⎜───────⎟ \n\ + ⎝x - 2⋅y⎠ \n\ +────────────────────────────────────────────\n\ + ⎛ 2 ⎞ \n\ +1 ⎛ x + y ⎞ ⎛x - y⎞ ⎜y - 2⋅y + 1⎟ ⎛1 - x⎞\n\ +─ + ⎜───────⎟⋅⎜─────⎟⋅⎜────────────⎟⋅⎜─────⎟\n\ +1 ⎝x - 2⋅y⎠ ⎝x + y⎠ ⎝ y + 5 ⎠ ⎝x - y⎠\ +""" + expected4 = \ +"""\ + ⎛ x + y ⎞ ⎛x - y⎞ \n\ + ⎜───────⎟⋅⎜─────⎟ \n\ + ⎝x - 2⋅y⎠ ⎝x + y⎠ \n\ +─────────────────────\n\ +1 ⎛ x + y ⎞ ⎛x - y⎞\n\ +─ + ⎜───────⎟⋅⎜─────⎟\n\ +1 ⎝x - 2⋅y⎠ ⎝x + y⎠\ +""" + expected5 = \ +"""\ + ⎛ x + y ⎞ ⎛x - y⎞ \n\ + ⎜───────⎟⋅⎜─────⎟ \n\ + ⎝x - 2⋅y⎠ ⎝x + y⎠ \n\ +─────────────────────────────\n\ +1 ⎛ x + y ⎞ ⎛x - y⎞ ⎛1 - x⎞\n\ +─ + ⎜───────⎟⋅⎜─────⎟⋅⎜─────⎟\n\ +1 ⎝x - 2⋅y⎠ ⎝x + y⎠ ⎝x - y⎠\ +""" + expected6 = \ +"""\ + ⎛ 2 ⎞ \n\ + ⎜y - 2⋅y + 1⎟ ⎛1 - x⎞ \n\ + ⎜────────────⎟⋅⎜─────⎟ \n\ + ⎝ y + 5 ⎠ ⎝x - y⎠ \n\ +────────────────────────────────────────────\n\ + ⎛ 2 ⎞ \n\ +1 ⎜y - 2⋅y + 1⎟ ⎛1 - x⎞ ⎛x - y⎞ ⎛ x + y ⎞\n\ +─ + ⎜────────────⎟⋅⎜─────⎟⋅⎜─────⎟⋅⎜───────⎟\n\ +1 ⎝ y + 5 ⎠ ⎝x - y⎠ ⎝x + y⎠ ⎝x - 2⋅y⎠\ +""" + expected7 = \ +"""\ + ⎛ 3⎞ \n\ + ⎜x - 2⋅y ⎟ \n\ + ⎜────────⎟ \n\ + ⎝ x + y ⎠ \n\ +──────────────────\n\ + ⎛ 3⎞ \n\ +1 ⎜x - 2⋅y ⎟ ⎛2⎞\n\ +─ + ⎜────────⎟⋅⎜─⎟\n\ +1 ⎝ x + y ⎠ ⎝2⎠\ +""" + expected8 = \ +"""\ + ⎛1 - x⎞ \n\ + ⎜─────⎟ \n\ + ⎝x - y⎠ \n\ +───────────\n\ +1 ⎛1 - x⎞\n\ +─ + ⎜─────⎟\n\ +1 ⎝x - y⎠\ +""" + expected9 = \ +"""\ + ⎛ x + y ⎞ ⎛x - y⎞ \n\ + ⎜───────⎟⋅⎜─────⎟ \n\ + ⎝x - 2⋅y⎠ ⎝x + y⎠ \n\ +─────────────────────────────\n\ +1 ⎛ x + y ⎞ ⎛x - y⎞ ⎛1 - x⎞\n\ +─ - ⎜───────⎟⋅⎜─────⎟⋅⎜─────⎟\n\ +1 ⎝x - 2⋅y⎠ ⎝x + y⎠ ⎝x - y⎠\ +""" + expected10 = \ +"""\ + ⎛1 - x⎞ \n\ + ⎜─────⎟ \n\ + ⎝x - y⎠ \n\ +───────────\n\ +1 ⎛1 - x⎞\n\ +─ - ⎜─────⎟\n\ +1 ⎝x - y⎠\ +""" + assert upretty(Feedback(tf, tf1)) == expected1 + assert upretty(Feedback(tf, tf2*tf1*tf3)) == expected2 + assert upretty(Feedback(tf1, tf2*tf3*tf5)) == expected3 + assert upretty(Feedback(tf1*tf2, tf)) == expected4 + assert upretty(Feedback(tf1*tf2, tf5)) == expected5 + assert upretty(Feedback(tf3*tf5, tf2*tf1)) == expected6 + assert upretty(Feedback(tf4, tf6)) == expected7 + assert upretty(Feedback(tf5, tf)) == expected8 + + assert upretty(Feedback(tf1*tf2, tf5, 1)) == expected9 + assert upretty(Feedback(tf5, tf, 1)) == expected10 + + +def test_pretty_MIMOFeedback(): + tf1 = TransferFunction(x + y, x - 2*y, y) + tf2 = TransferFunction(x - y, x + y, y) + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + tfm_3 = TransferFunctionMatrix([[tf1, tf1], [tf2, tf2]]) + + expected1 = \ +"""\ +⎛ ⎡ x + y x - y ⎤ ⎡ x - y x + y ⎤ ⎞-1 ⎡ x + y x - y ⎤ \n\ +⎜ ⎢─────── ───── ⎥ ⎢ ───── ───────⎥ ⎟ ⎢─────── ───── ⎥ \n\ +⎜ ⎢x - 2⋅y x + y ⎥ ⎢ x + y x - 2⋅y⎥ ⎟ ⎢x - 2⋅y x + y ⎥ \n\ +⎜I - ⎢ ⎥ ⋅⎢ ⎥ ⎟ ⋅ ⎢ ⎥ \n\ +⎜ ⎢ x - y x + y ⎥ ⎢ x + y x - y ⎥ ⎟ ⎢ x - y x + y ⎥ \n\ +⎜ ⎢ ───── ───────⎥ ⎢─────── ───── ⎥ ⎟ ⎢ ───── ───────⎥ \n\ +⎝ ⎣ x + y x - 2⋅y⎦τ ⎣x - 2⋅y x + y ⎦τ⎠ ⎣ x + y x - 2⋅y⎦τ\ +""" + expected2 = \ +"""\ +⎛ ⎡ x + y x - y ⎤ ⎡ x - y x + y ⎤ ⎡ x + y x + y ⎤ ⎞-1 ⎡ x + y x - y ⎤ ⎡ x - y x + y ⎤ \n\ +⎜ ⎢─────── ───── ⎥ ⎢ ───── ───────⎥ ⎢─────── ───────⎥ ⎟ ⎢─────── ───── ⎥ ⎢ ───── ───────⎥ \n\ +⎜ ⎢x - 2⋅y x + y ⎥ ⎢ x + y x - 2⋅y⎥ ⎢x - 2⋅y x - 2⋅y⎥ ⎟ ⎢x - 2⋅y x + y ⎥ ⎢ x + y x - 2⋅y⎥ \n\ +⎜I + ⎢ ⎥ ⋅⎢ ⎥ ⋅⎢ ⎥ ⎟ ⋅ ⎢ ⎥ ⋅⎢ ⎥ \n\ +⎜ ⎢ x - y x + y ⎥ ⎢ x + y x - y ⎥ ⎢ x - y x - y ⎥ ⎟ ⎢ x - y x + y ⎥ ⎢ x + y x - y ⎥ \n\ +⎜ ⎢ ───── ───────⎥ ⎢─────── ───── ⎥ ⎢ ───── ───── ⎥ ⎟ ⎢ ───── ───────⎥ ⎢─────── ───── ⎥ \n\ +⎝ ⎣ x + y x - 2⋅y⎦τ ⎣x - 2⋅y x + y ⎦τ ⎣ x + y x + y ⎦τ⎠ ⎣ x + y x - 2⋅y⎦τ ⎣x - 2⋅y x + y ⎦τ\ +""" + + assert upretty(MIMOFeedback(tfm_1, tfm_2, 1)) == \ + expected1 # Positive MIMOFeedback + assert upretty(MIMOFeedback(tfm_1*tfm_2, tfm_3)) == \ + expected2 # Negative MIMOFeedback (Default) + + +def test_pretty_TransferFunctionMatrix(): + tf1 = TransferFunction(x + y, x - 2*y, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(y**2 - 2*y + 1, y + 5, y) + tf4 = TransferFunction(y, x**2 + x + 1, y) + tf5 = TransferFunction(1 - x, x - y, y) + tf6 = TransferFunction(2, 2, y) + expected1 = \ +"""\ +⎡ x + y ⎤ \n\ +⎢───────⎥ \n\ +⎢x - 2⋅y⎥ \n\ +⎢ ⎥ \n\ +⎢ x - y ⎥ \n\ +⎢ ───── ⎥ \n\ +⎣ x + y ⎦τ\ +""" + expected2 = \ +"""\ +⎡ x + y ⎤ \n\ +⎢ ─────── ⎥ \n\ +⎢ x - 2⋅y ⎥ \n\ +⎢ ⎥ \n\ +⎢ x - y ⎥ \n\ +⎢ ───── ⎥ \n\ +⎢ x + y ⎥ \n\ +⎢ ⎥ \n\ +⎢ 2 ⎥ \n\ +⎢- y + 2⋅y - 1⎥ \n\ +⎢──────────────⎥ \n\ +⎣ y + 5 ⎦τ\ +""" + expected3 = \ +"""\ +⎡ x + y x - y ⎤ \n\ +⎢ ─────── ───── ⎥ \n\ +⎢ x - 2⋅y x + y ⎥ \n\ +⎢ ⎥ \n\ +⎢ 2 ⎥ \n\ +⎢y - 2⋅y + 1 y ⎥ \n\ +⎢──────────── ──────────⎥ \n\ +⎢ y + 5 2 ⎥ \n\ +⎢ x + x + 1⎥ \n\ +⎢ ⎥ \n\ +⎢ 1 - x 2 ⎥ \n\ +⎢ ───── ─ ⎥ \n\ +⎣ x - y 2 ⎦τ\ +""" + expected4 = \ +"""\ +⎡ x - y x + y y ⎤ \n\ +⎢ ───── ─────── ──────────⎥ \n\ +⎢ x + y x - 2⋅y 2 ⎥ \n\ +⎢ x + x + 1⎥ \n\ +⎢ ⎥ \n\ +⎢ 2 ⎥ \n\ +⎢- y + 2⋅y - 1 x - 1 -2 ⎥ \n\ +⎢────────────── ───── ─── ⎥ \n\ +⎣ y + 5 x - y 2 ⎦τ\ +""" + expected5 = \ +"""\ +⎡ x + y x - y x + y y ⎤ \n\ +⎢───────⋅───── ─────── ──────────⎥ \n\ +⎢x - 2⋅y x + y x - 2⋅y 2 ⎥ \n\ +⎢ x + x + 1⎥ \n\ +⎢ ⎥ \n\ +⎢ 1 - x 2 x + y -2 ⎥ \n\ +⎢ ───── + ─ ─────── ─── ⎥ \n\ +⎣ x - y 2 x - 2⋅y 2 ⎦τ\ +""" + + assert upretty(TransferFunctionMatrix([[tf1], [tf2]])) == expected1 + assert upretty(TransferFunctionMatrix([[tf1], [tf2], [-tf3]])) == expected2 + assert upretty(TransferFunctionMatrix([[tf1, tf2], [tf3, tf4], [tf5, tf6]])) == expected3 + assert upretty(TransferFunctionMatrix([[tf2, tf1, tf4], [-tf3, -tf5, -tf6]])) == expected4 + assert upretty(TransferFunctionMatrix([[Series(tf2, tf1), tf1, tf4], [Parallel(tf6, tf5), tf1, -tf6]])) == \ + expected5 + + +def test_pretty_StateSpace(): + ss1 = StateSpace(Matrix([a]), Matrix([b]), Matrix([c]), Matrix([d])) + A = Matrix([[0, 1], [1, 0]]) + B = Matrix([1, 0]) + C = Matrix([[0, 1]]) + D = Matrix([0]) + ss2 = StateSpace(A, B, C, D) + ss3 = StateSpace(Matrix([[-1.5, -2], [1, 0]]), + Matrix([[0.5, 0], [0, 1]]), + Matrix([[0, 1], [0, 2]]), + Matrix([[2, 2], [1, 1]])) + + expected1 = \ +"""\ +⎡[a] [b]⎤\n\ +⎢ ⎥\n\ +⎣[c] [d]⎦\ +""" + expected2 = \ +"""\ +⎡⎡0 1⎤ ⎡1⎤⎤\n\ +⎢⎢ ⎥ ⎢ ⎥⎥\n\ +⎢⎣1 0⎦ ⎣0⎦⎥\n\ +⎢ ⎥\n\ +⎣[0 1] [0]⎦\ +""" + expected3 = \ +"""\ +⎡⎡-1.5 -2⎤ ⎡0.5 0⎤⎤\n\ +⎢⎢ ⎥ ⎢ ⎥⎥\n\ +⎢⎣ 1 0 ⎦ ⎣ 0 1⎦⎥\n\ +⎢ ⎥\n\ +⎢ ⎡0 1⎤ ⎡2 2⎤ ⎥\n\ +⎢ ⎢ ⎥ ⎢ ⎥ ⎥\n\ +⎣ ⎣0 2⎦ ⎣1 1⎦ ⎦\ +""" + + assert upretty(ss1) == expected1 + assert upretty(ss2) == expected2 + assert upretty(ss3) == expected3 + +def test_pretty_order(): + expr = O(1) + ascii_str = \ +"""\ +O(1)\ +""" + ucode_str = \ +"""\ +O(1)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = O(1/x) + ascii_str = \ +"""\ + /1\\\n\ +O|-|\n\ + \\x/\ +""" + ucode_str = \ +"""\ + ⎛1⎞\n\ +O⎜─⎟\n\ + ⎝x⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = O(x**2 + y**2) + ascii_str = \ +"""\ + / 2 2 \\\n\ +O\\x + y ; (x, y) -> (0, 0)/\ +""" + ucode_str = \ +"""\ + ⎛ 2 2 ⎞\n\ +O⎝x + y ; (x, y) → (0, 0)⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = O(1, (x, oo)) + ascii_str = \ +"""\ +O(1; x -> oo)\ +""" + ucode_str = \ +"""\ +O(1; x → ∞)\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = O(1/x, (x, oo)) + ascii_str = \ +"""\ + /1 \\\n\ +O|-; x -> oo|\n\ + \\x /\ +""" + ucode_str = \ +"""\ + ⎛1 ⎞\n\ +O⎜─; x → ∞⎟\n\ + ⎝x ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = O(x**2 + y**2, (x, oo), (y, oo)) + ascii_str = \ +"""\ + / 2 2 \\\n\ +O\\x + y ; (x, y) -> (oo, oo)/\ +""" + ucode_str = \ +"""\ + ⎛ 2 2 ⎞\n\ +O⎝x + y ; (x, y) → (∞, ∞)⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_derivatives(): + # Simple + expr = Derivative(log(x), x, evaluate=False) + ascii_str = \ +"""\ +d \n\ +--(log(x))\n\ +dx \ +""" + ucode_str = \ +"""\ +d \n\ +──(log(x))\n\ +dx \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Derivative(log(x), x, evaluate=False) + x + ascii_str_1 = \ +"""\ + d \n\ +x + --(log(x))\n\ + dx \ +""" + ascii_str_2 = \ +"""\ +d \n\ +--(log(x)) + x\n\ +dx \ +""" + ucode_str_1 = \ +"""\ + d \n\ +x + ──(log(x))\n\ + dx \ +""" + ucode_str_2 = \ +"""\ +d \n\ +──(log(x)) + x\n\ +dx \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + # basic partial derivatives + expr = Derivative(log(x + y) + x, x) + ascii_str_1 = \ +"""\ +d \n\ +--(log(x + y) + x)\n\ +dx \ +""" + ascii_str_2 = \ +"""\ +d \n\ +--(x + log(x + y))\n\ +dx \ +""" + ucode_str_1 = \ +"""\ +∂ \n\ +──(log(x + y) + x)\n\ +∂x \ +""" + ucode_str_2 = \ +"""\ +∂ \n\ +──(x + log(x + y))\n\ +∂x \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2], upretty(expr) + + # Multiple symbols + expr = Derivative(log(x) + x**2, x, y) + ascii_str_1 = \ +"""\ + 2 \n\ + d / 2\\\n\ +-----\\log(x) + x /\n\ +dy dx \ +""" + ascii_str_2 = \ +"""\ + 2 \n\ + d / 2 \\\n\ +-----\\x + log(x)/\n\ +dy dx \ +""" + ascii_str_3 = \ +"""\ + 2 \n\ + d / 2 \\\n\ +-----\\x + log(x)/\n\ +dy dx \ +""" + ucode_str_1 = \ +"""\ + 2 \n\ + d ⎛ 2⎞\n\ +─────⎝log(x) + x ⎠\n\ +dy dx \ +""" + ucode_str_2 = \ +"""\ + 2 \n\ + d ⎛ 2 ⎞\n\ +─────⎝x + log(x)⎠\n\ +dy dx \ +""" + ucode_str_3 = \ +"""\ + 2 \n\ + d ⎛ 2 ⎞\n\ +─────⎝x + log(x)⎠\n\ +dy dx \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2, ascii_str_3] + assert upretty(expr) in [ucode_str_1, ucode_str_2, ucode_str_3] + + expr = Derivative(2*x*y, y, x) + x**2 + ascii_str_1 = \ +"""\ + 2 \n\ + d 2\n\ +-----(2*x*y) + x \n\ +dx dy \ +""" + ascii_str_2 = \ +"""\ + 2 \n\ + 2 d \n\ +x + -----(2*x*y)\n\ + dx dy \ +""" + ascii_str_3 = \ +"""\ + 2 \n\ + 2 d \n\ +x + -----(2*x*y)\n\ + dx dy \ +""" + ucode_str_1 = \ +"""\ + 2 \n\ + ∂ 2\n\ +─────(2⋅x⋅y) + x \n\ +∂x ∂y \ +""" + ucode_str_2 = \ +"""\ + 2 \n\ + 2 ∂ \n\ +x + ─────(2⋅x⋅y)\n\ + ∂x ∂y \ +""" + ucode_str_3 = \ +"""\ + 2 \n\ + 2 ∂ \n\ +x + ─────(2⋅x⋅y)\n\ + ∂x ∂y \ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2, ascii_str_3] + assert upretty(expr) in [ucode_str_1, ucode_str_2, ucode_str_3] + + expr = Derivative(2*x*y, x, x) + ascii_str = \ +"""\ + 2 \n\ +d \n\ +---(2*x*y)\n\ + 2 \n\ +dx \ +""" + ucode_str = \ +"""\ + 2 \n\ +∂ \n\ +───(2⋅x⋅y)\n\ + 2 \n\ +∂x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Derivative(2*x*y, x, 17) + ascii_str = \ +"""\ + 17 \n\ +d \n\ +----(2*x*y)\n\ + 17 \n\ +dx \ +""" + ucode_str = \ +"""\ + 17 \n\ +∂ \n\ +────(2⋅x⋅y)\n\ + 17 \n\ +∂x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Derivative(2*x*y, x, x, y) + ascii_str = \ +"""\ + 3 \n\ + d \n\ +------(2*x*y)\n\ + 2 \n\ +dy dx \ +""" + ucode_str = \ +"""\ + 3 \n\ + ∂ \n\ +──────(2⋅x⋅y)\n\ + 2 \n\ +∂y ∂x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + # Greek letters + alpha = Symbol('alpha') + beta = Function('beta') + expr = beta(alpha).diff(alpha) + ascii_str = \ +"""\ + d \n\ +------(beta(alpha))\n\ +dalpha \ +""" + ucode_str = \ +"""\ +d \n\ +──(β(α))\n\ +dα \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Derivative(f(x), (x, n)) + + ascii_str = \ +"""\ + n \n\ +d \n\ +---(f(x))\n\ + n \n\ +dx \ +""" + ucode_str = \ +"""\ + n \n\ +d \n\ +───(f(x))\n\ + n \n\ +dx \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_integrals(): + expr = Integral(log(x), x) + ascii_str = \ +"""\ + / \n\ + | \n\ + | log(x) dx\n\ + | \n\ +/ \ +""" + ucode_str = \ +"""\ +⌠ \n\ +⎮ log(x) dx\n\ +⌡ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(x**2, x) + ascii_str = \ +"""\ + / \n\ + | \n\ + | 2 \n\ + | x dx\n\ + | \n\ +/ \ +""" + ucode_str = \ +"""\ +⌠ \n\ +⎮ 2 \n\ +⎮ x dx\n\ +⌡ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral((sin(x))**2 / (tan(x))**2) + ascii_str = \ +"""\ + / \n\ + | \n\ + | 2 \n\ + | sin (x) \n\ + | ------- dx\n\ + | 2 \n\ + | tan (x) \n\ + | \n\ +/ \ +""" + ucode_str = \ +"""\ +⌠ \n\ +⎮ 2 \n\ +⎮ sin (x) \n\ +⎮ ─────── dx\n\ +⎮ 2 \n\ +⎮ tan (x) \n\ +⌡ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(x**(2**x), x) + ascii_str = \ +"""\ + / \n\ + | \n\ + | / x\\ \n\ + | \\2 / \n\ + | x dx\n\ + | \n\ +/ \ +""" + ucode_str = \ +"""\ +⌠ \n\ +⎮ ⎛ x⎞ \n\ +⎮ ⎝2 ⎠ \n\ +⎮ x dx\n\ +⌡ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(x**2, (x, 1, 2)) + ascii_str = \ +"""\ + 2 \n\ + / \n\ + | \n\ + | 2 \n\ + | x dx\n\ + | \n\ +/ \n\ +1 \ +""" + ucode_str = \ +"""\ +2 \n\ +⌠ \n\ +⎮ 2 \n\ +⎮ x dx\n\ +⌡ \n\ +1 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(x**2, (x, Rational(1, 2), 10)) + ascii_str = \ +"""\ + 10 \n\ + / \n\ + | \n\ + | 2 \n\ + | x dx\n\ + | \n\ +/ \n\ +1/2 \ +""" + ucode_str = \ +"""\ +10 \n\ +⌠ \n\ +⎮ 2 \n\ +⎮ x dx\n\ +⌡ \n\ +1/2 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(x**2*y**2, x, y) + ascii_str = \ +"""\ + / / \n\ + | | \n\ + | | 2 2 \n\ + | | x *y dx dy\n\ + | | \n\ +/ / \ +""" + ucode_str = \ +"""\ +⌠ ⌠ \n\ +⎮ ⎮ 2 2 \n\ +⎮ ⎮ x ⋅y dx dy\n\ +⌡ ⌡ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(sin(th)/cos(ph), (th, 0, pi), (ph, 0, 2*pi)) + ascii_str = \ +"""\ + 2*pi pi \n\ + / / \n\ + | | \n\ + | | sin(theta) \n\ + | | ---------- d(theta) d(phi)\n\ + | | cos(phi) \n\ + | | \n\ + / / \n\ +0 0 \ +""" + ucode_str = \ +"""\ +2⋅π π \n\ + ⌠ ⌠ \n\ + ⎮ ⎮ sin(θ) \n\ + ⎮ ⎮ ────── dθ dφ\n\ + ⎮ ⎮ cos(φ) \n\ + ⌡ ⌡ \n\ + 0 0 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_matrix(): + # Empty Matrix + expr = Matrix() + ascii_str = "[]" + unicode_str = "[]" + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + expr = Matrix(2, 0, lambda i, j: 0) + ascii_str = "[]" + unicode_str = "[]" + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + expr = Matrix(0, 2, lambda i, j: 0) + ascii_str = "[]" + unicode_str = "[]" + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + expr = Matrix([[x**2 + 1, 1], [y, x + y]]) + ascii_str_1 = \ +"""\ +[ 2 ] +[1 + x 1 ] +[ ] +[ y x + y]\ +""" + ascii_str_2 = \ +"""\ +[ 2 ] +[x + 1 1 ] +[ ] +[ y x + y]\ +""" + ucode_str_1 = \ +"""\ +⎡ 2 ⎤ +⎢1 + x 1 ⎥ +⎢ ⎥ +⎣ y x + y⎦\ +""" + ucode_str_2 = \ +"""\ +⎡ 2 ⎤ +⎢x + 1 1 ⎥ +⎢ ⎥ +⎣ y x + y⎦\ +""" + assert pretty(expr) in [ascii_str_1, ascii_str_2] + assert upretty(expr) in [ucode_str_1, ucode_str_2] + + expr = Matrix([[x/y, y, th], [0, exp(I*k*ph), 1]]) + ascii_str = \ +"""\ +[x ] +[- y theta] +[y ] +[ ] +[ I*k*phi ] +[0 e 1 ]\ +""" + ucode_str = \ +"""\ +⎡x ⎤ +⎢─ y θ⎥ +⎢y ⎥ +⎢ ⎥ +⎢ ⅈ⋅k⋅φ ⎥ +⎣0 ℯ 1⎦\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + unicode_str = \ +"""\ +⎡v̇_msc_00 0 0 ⎤ +⎢ ⎥ +⎢ 0 v̇_msc_01 0 ⎥ +⎢ ⎥ +⎣ 0 0 v̇_msc_02⎦\ +""" + + expr = diag(*MatrixSymbol('vdot_msc',1,3)) + assert upretty(expr) == unicode_str + + +def test_pretty_ndim_arrays(): + x, y, z, w = symbols("x y z w") + + for ArrayType in (ImmutableDenseNDimArray, ImmutableSparseNDimArray, MutableDenseNDimArray, MutableSparseNDimArray): + # Basic: scalar array + M = ArrayType(x) + + assert pretty(M) == "x" + assert upretty(M) == "x" + + M = ArrayType([[1/x, y], [z, w]]) + M1 = ArrayType([1/x, y, z]) + + M2 = tensorproduct(M1, M) + M3 = tensorproduct(M, M) + + ascii_str = \ +"""\ +[1 ]\n\ +[- y]\n\ +[x ]\n\ +[ ]\n\ +[z w]\ +""" + ucode_str = \ +"""\ +⎡1 ⎤\n\ +⎢─ y⎥\n\ +⎢x ⎥\n\ +⎢ ⎥\n\ +⎣z w⎦\ +""" + assert pretty(M) == ascii_str + assert upretty(M) == ucode_str + + ascii_str = \ +"""\ +[1 ]\n\ +[- y z]\n\ +[x ]\ +""" + ucode_str = \ +"""\ +⎡1 ⎤\n\ +⎢─ y z⎥\n\ +⎣x ⎦\ +""" + assert pretty(M1) == ascii_str + assert upretty(M1) == ucode_str + + ascii_str = \ +"""\ +[[1 y] ]\n\ +[[-- -] [z ]]\n\ +[[ 2 x] [ y 2 ] [- y*z]]\n\ +[[x ] [ - y ] [x ]]\n\ +[[ ] [ x ] [ ]]\n\ +[[z w] [ ] [ 2 ]]\n\ +[[- -] [y*z w*y] [z w*z]]\n\ +[[x x] ]\ +""" + ucode_str = \ +"""\ +⎡⎡1 y⎤ ⎤\n\ +⎢⎢── ─⎥ ⎡z ⎤⎥\n\ +⎢⎢ 2 x⎥ ⎡ y 2 ⎤ ⎢─ y⋅z⎥⎥\n\ +⎢⎢x ⎥ ⎢ ─ y ⎥ ⎢x ⎥⎥\n\ +⎢⎢ ⎥ ⎢ x ⎥ ⎢ ⎥⎥\n\ +⎢⎢z w⎥ ⎢ ⎥ ⎢ 2 ⎥⎥\n\ +⎢⎢─ ─⎥ ⎣y⋅z w⋅y⎦ ⎣z w⋅z⎦⎥\n\ +⎣⎣x x⎦ ⎦\ +""" + assert pretty(M2) == ascii_str + assert upretty(M2) == ucode_str + + ascii_str = \ +"""\ +[ [1 y] ]\n\ +[ [-- -] ]\n\ +[ [ 2 x] [ y 2 ]]\n\ +[ [x ] [ - y ]]\n\ +[ [ ] [ x ]]\n\ +[ [z w] [ ]]\n\ +[ [- -] [y*z w*y]]\n\ +[ [x x] ]\n\ +[ ]\n\ +[[z ] [ w ]]\n\ +[[- y*z] [ - w*y]]\n\ +[[x ] [ x ]]\n\ +[[ ] [ ]]\n\ +[[ 2 ] [ 2 ]]\n\ +[[z w*z] [w*z w ]]\ +""" + ucode_str = \ +"""\ +⎡ ⎡1 y⎤ ⎤\n\ +⎢ ⎢── ─⎥ ⎥\n\ +⎢ ⎢ 2 x⎥ ⎡ y 2 ⎤⎥\n\ +⎢ ⎢x ⎥ ⎢ ─ y ⎥⎥\n\ +⎢ ⎢ ⎥ ⎢ x ⎥⎥\n\ +⎢ ⎢z w⎥ ⎢ ⎥⎥\n\ +⎢ ⎢─ ─⎥ ⎣y⋅z w⋅y⎦⎥\n\ +⎢ ⎣x x⎦ ⎥\n\ +⎢ ⎥\n\ +⎢⎡z ⎤ ⎡ w ⎤⎥\n\ +⎢⎢─ y⋅z⎥ ⎢ ─ w⋅y⎥⎥\n\ +⎢⎢x ⎥ ⎢ x ⎥⎥\n\ +⎢⎢ ⎥ ⎢ ⎥⎥\n\ +⎢⎢ 2 ⎥ ⎢ 2 ⎥⎥\n\ +⎣⎣z w⋅z⎦ ⎣w⋅z w ⎦⎦\ +""" + assert pretty(M3) == ascii_str + assert upretty(M3) == ucode_str + + Mrow = ArrayType([[x, y, 1 / z]]) + Mcolumn = ArrayType([[x], [y], [1 / z]]) + Mcol2 = ArrayType([Mcolumn.tolist()]) + + ascii_str = \ +"""\ +[[ 1]]\n\ +[[x y -]]\n\ +[[ z]]\ +""" + ucode_str = \ +"""\ +⎡⎡ 1⎤⎤\n\ +⎢⎢x y ─⎥⎥\n\ +⎣⎣ z⎦⎦\ +""" + assert pretty(Mrow) == ascii_str + assert upretty(Mrow) == ucode_str + + ascii_str = \ +"""\ +[x]\n\ +[ ]\n\ +[y]\n\ +[ ]\n\ +[1]\n\ +[-]\n\ +[z]\ +""" + ucode_str = \ +"""\ +⎡x⎤\n\ +⎢ ⎥\n\ +⎢y⎥\n\ +⎢ ⎥\n\ +⎢1⎥\n\ +⎢─⎥\n\ +⎣z⎦\ +""" + assert pretty(Mcolumn) == ascii_str + assert upretty(Mcolumn) == ucode_str + + ascii_str = \ +"""\ +[[x]]\n\ +[[ ]]\n\ +[[y]]\n\ +[[ ]]\n\ +[[1]]\n\ +[[-]]\n\ +[[z]]\ +""" + ucode_str = \ +"""\ +⎡⎡x⎤⎤\n\ +⎢⎢ ⎥⎥\n\ +⎢⎢y⎥⎥\n\ +⎢⎢ ⎥⎥\n\ +⎢⎢1⎥⎥\n\ +⎢⎢─⎥⎥\n\ +⎣⎣z⎦⎦\ +""" + assert pretty(Mcol2) == ascii_str + assert upretty(Mcol2) == ucode_str + + +def test_tensor_TensorProduct(): + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + assert upretty(TensorProduct(A, B)) == "A\u2297B" + assert upretty(TensorProduct(A, B, A)) == "A\u2297B\u2297A" + + +def test_diffgeom_print_WedgeProduct(): + from sympy.diffgeom.rn import R2 + from sympy.diffgeom import WedgeProduct + wp = WedgeProduct(R2.dx, R2.dy) + assert upretty(wp) == "ⅆ x∧ⅆ y" + assert pretty(wp) == r"d x/\d y" + + +def test_Adjoint(): + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert pretty(Adjoint(X)) == " +\nX " + assert pretty(Adjoint(X + Y)) == " +\n(X + Y) " + assert pretty(Adjoint(X) + Adjoint(Y)) == " + +\nX + Y " + assert pretty(Adjoint(X*Y)) == " +\n(X*Y) " + assert pretty(Adjoint(Y)*Adjoint(X)) == " + +\nY *X " + assert pretty(Adjoint(X**2)) == " +\n/ 2\\ \n\\X / " + assert pretty(Adjoint(X)**2) == " 2\n/ +\\ \n\\X / " + assert pretty(Adjoint(Inverse(X))) == " +\n/ -1\\ \n\\X / " + assert pretty(Inverse(Adjoint(X))) == " -1\n/ +\\ \n\\X / " + assert pretty(Adjoint(Transpose(X))) == " +\n/ T\\ \n\\X / " + assert pretty(Transpose(Adjoint(X))) == " T\n/ +\\ \n\\X / " + assert upretty(Adjoint(X)) == " †\nX " + assert upretty(Adjoint(X + Y)) == " †\n(X + Y) " + assert upretty(Adjoint(X) + Adjoint(Y)) == " † †\nX + Y " + assert upretty(Adjoint(X*Y)) == " †\n(X⋅Y) " + assert upretty(Adjoint(Y)*Adjoint(X)) == " † †\nY ⋅X " + assert upretty(Adjoint(X**2)) == \ + " †\n⎛ 2⎞ \n⎝X ⎠ " + assert upretty(Adjoint(X)**2) == \ + " 2\n⎛ †⎞ \n⎝X ⎠ " + assert upretty(Adjoint(Inverse(X))) == \ + " †\n⎛ -1⎞ \n⎝X ⎠ " + assert upretty(Inverse(Adjoint(X))) == \ + " -1\n⎛ †⎞ \n⎝X ⎠ " + assert upretty(Adjoint(Transpose(X))) == \ + " †\n⎛ T⎞ \n⎝X ⎠ " + assert upretty(Transpose(Adjoint(X))) == \ + " T\n⎛ †⎞ \n⎝X ⎠ " + m = Matrix(((1, 2), (3, 4))) + assert upretty(Adjoint(m)) == \ + ' †\n'\ + '⎡1 2⎤ \n'\ + '⎢ ⎥ \n'\ + '⎣3 4⎦ ' + assert upretty(Adjoint(m+X)) == \ + ' †\n'\ + '⎛⎡1 2⎤ ⎞ \n'\ + '⎜⎢ ⎥ + X⎟ \n'\ + '⎝⎣3 4⎦ ⎠ ' + assert upretty(Adjoint(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + ' †\n'\ + '⎡ 𝟙 X⎤ \n'\ + '⎢ ⎥ \n'\ + '⎢⎡1 2⎤ ⎥ \n'\ + '⎢⎢ ⎥ 𝟘⎥ \n'\ + '⎣⎣3 4⎦ ⎦ ' + + +def test_Transpose(): + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert pretty(Transpose(X)) == " T\nX " + assert pretty(Transpose(X + Y)) == " T\n(X + Y) " + assert pretty(Transpose(X) + Transpose(Y)) == " T T\nX + Y " + assert pretty(Transpose(X*Y)) == " T\n(X*Y) " + assert pretty(Transpose(Y)*Transpose(X)) == " T T\nY *X " + assert pretty(Transpose(X**2)) == " T\n/ 2\\ \n\\X / " + assert pretty(Transpose(X)**2) == " 2\n/ T\\ \n\\X / " + assert pretty(Transpose(Inverse(X))) == " T\n/ -1\\ \n\\X / " + assert pretty(Inverse(Transpose(X))) == " -1\n/ T\\ \n\\X / " + assert upretty(Transpose(X)) == " T\nX " + assert upretty(Transpose(X + Y)) == " T\n(X + Y) " + assert upretty(Transpose(X) + Transpose(Y)) == " T T\nX + Y " + assert upretty(Transpose(X*Y)) == " T\n(X⋅Y) " + assert upretty(Transpose(Y)*Transpose(X)) == " T T\nY ⋅X " + assert upretty(Transpose(X**2)) == \ + " T\n⎛ 2⎞ \n⎝X ⎠ " + assert upretty(Transpose(X)**2) == \ + " 2\n⎛ T⎞ \n⎝X ⎠ " + assert upretty(Transpose(Inverse(X))) == \ + " T\n⎛ -1⎞ \n⎝X ⎠ " + assert upretty(Inverse(Transpose(X))) == \ + " -1\n⎛ T⎞ \n⎝X ⎠ " + m = Matrix(((1, 2), (3, 4))) + assert upretty(Transpose(m)) == \ + ' T\n'\ + '⎡1 2⎤ \n'\ + '⎢ ⎥ \n'\ + '⎣3 4⎦ ' + assert upretty(Transpose(m+X)) == \ + ' T\n'\ + '⎛⎡1 2⎤ ⎞ \n'\ + '⎜⎢ ⎥ + X⎟ \n'\ + '⎝⎣3 4⎦ ⎠ ' + assert upretty(Transpose(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + ' T\n'\ + '⎡ 𝟙 X⎤ \n'\ + '⎢ ⎥ \n'\ + '⎢⎡1 2⎤ ⎥ \n'\ + '⎢⎢ ⎥ 𝟘⎥ \n'\ + '⎣⎣3 4⎦ ⎦ ' + + +def test_pretty_Trace_issue_9044(): + X = Matrix([[1, 2], [3, 4]]) + Y = Matrix([[2, 4], [6, 8]]) + ascii_str_1 = \ +"""\ + /[1 2]\\ +tr|[ ]| + \\[3 4]/\ +""" + ucode_str_1 = \ +"""\ + ⎛⎡1 2⎤⎞ +tr⎜⎢ ⎥⎟ + ⎝⎣3 4⎦⎠\ +""" + ascii_str_2 = \ +"""\ + /[1 2]\\ /[2 4]\\ +tr|[ ]| + tr|[ ]| + \\[3 4]/ \\[6 8]/\ +""" + ucode_str_2 = \ +"""\ + ⎛⎡1 2⎤⎞ ⎛⎡2 4⎤⎞ +tr⎜⎢ ⎥⎟ + tr⎜⎢ ⎥⎟ + ⎝⎣3 4⎦⎠ ⎝⎣6 8⎦⎠\ +""" + assert pretty(Trace(X)) == ascii_str_1 + assert upretty(Trace(X)) == ucode_str_1 + + assert pretty(Trace(X) + Trace(Y)) == ascii_str_2 + assert upretty(Trace(X) + Trace(Y)) == ucode_str_2 + + +def test_MatrixSlice(): + n = Symbol('n', integer=True) + x, y, z, w, t, = symbols('x y z w t') + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', 10, 10) + Z = MatrixSymbol('Z', 10, 10) + + expr = MatrixSlice(X, (None, None, None), (None, None, None)) + assert pretty(expr) == upretty(expr) == 'X[:, :]' + expr = X[x:x + 1, y:y + 1] + assert pretty(expr) == upretty(expr) == 'X[x:x + 1, y:y + 1]' + expr = X[x:x + 1:2, y:y + 1:2] + assert pretty(expr) == upretty(expr) == 'X[x:x + 1:2, y:y + 1:2]' + expr = X[:x, y:] + assert pretty(expr) == upretty(expr) == 'X[:x, y:]' + expr = X[:x, y:] + assert pretty(expr) == upretty(expr) == 'X[:x, y:]' + expr = X[x:, :y] + assert pretty(expr) == upretty(expr) == 'X[x:, :y]' + expr = X[x:y, z:w] + assert pretty(expr) == upretty(expr) == 'X[x:y, z:w]' + expr = X[x:y:t, w:t:x] + assert pretty(expr) == upretty(expr) == 'X[x:y:t, w:t:x]' + expr = X[x::y, t::w] + assert pretty(expr) == upretty(expr) == 'X[x::y, t::w]' + expr = X[:x:y, :t:w] + assert pretty(expr) == upretty(expr) == 'X[:x:y, :t:w]' + expr = X[::x, ::y] + assert pretty(expr) == upretty(expr) == 'X[::x, ::y]' + expr = MatrixSlice(X, (0, None, None), (0, None, None)) + assert pretty(expr) == upretty(expr) == 'X[:, :]' + expr = MatrixSlice(X, (None, n, None), (None, n, None)) + assert pretty(expr) == upretty(expr) == 'X[:, :]' + expr = MatrixSlice(X, (0, n, None), (0, n, None)) + assert pretty(expr) == upretty(expr) == 'X[:, :]' + expr = MatrixSlice(X, (0, n, 2), (0, n, 2)) + assert pretty(expr) == upretty(expr) == 'X[::2, ::2]' + expr = X[1:2:3, 4:5:6] + assert pretty(expr) == upretty(expr) == 'X[1:2:3, 4:5:6]' + expr = X[1:3:5, 4:6:8] + assert pretty(expr) == upretty(expr) == 'X[1:3:5, 4:6:8]' + expr = X[1:10:2] + assert pretty(expr) == upretty(expr) == 'X[1:10:2, :]' + expr = Y[:5, 1:9:2] + assert pretty(expr) == upretty(expr) == 'Y[:5, 1:9:2]' + expr = Y[:5, 1:10:2] + assert pretty(expr) == upretty(expr) == 'Y[:5, 1::2]' + expr = Y[5, :5:2] + assert pretty(expr) == upretty(expr) == 'Y[5:6, :5:2]' + expr = X[0:1, 0:1] + assert pretty(expr) == upretty(expr) == 'X[:1, :1]' + expr = X[0:1:2, 0:1:2] + assert pretty(expr) == upretty(expr) == 'X[:1:2, :1:2]' + expr = (Y + Z)[2:, 2:] + assert pretty(expr) == upretty(expr) == '(Y + Z)[2:, 2:]' + + +def test_MatrixExpressions(): + n = Symbol('n', integer=True) + X = MatrixSymbol('X', n, n) + + assert pretty(X) == upretty(X) == "X" + + # Apply function elementwise (`ElementwiseApplyFunc`): + + expr = (X.T*X).applyfunc(sin) + + ascii_str = """\ + / T \\\n\ +(d -> sin(d)).\\X *X/\ +""" + ucode_str = """\ + ⎛ T ⎞\n\ +(d ↦ sin(d))˳⎝X ⋅X⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + lamda = Lambda(x, 1/x) + expr = (n*X).applyfunc(lamda) + ascii_str = """\ +/ 1\\ \n\ +|x -> -|.(n*X)\n\ +\\ x/ \ +""" + ucode_str = """\ +⎛ 1⎞ \n\ +⎜x ↦ ─⎟˳(n⋅X)\n\ +⎝ x⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_dotproduct(): + from sympy.matrices.expressions.dotproduct import DotProduct + n = symbols("n", integer=True) + A = MatrixSymbol('A', n, 1) + B = MatrixSymbol('B', n, 1) + C = Matrix(1, 3, [1, 2, 3]) + D = Matrix(1, 3, [1, 3, 4]) + + assert pretty(DotProduct(A, B)) == "A*B" + assert pretty(DotProduct(C, D)) == "[1 2 3]*[1 3 4]" + assert upretty(DotProduct(A, B)) == "A⋅B" + assert upretty(DotProduct(C, D)) == "[1 2 3]⋅[1 3 4]" + + +def test_pretty_Determinant(): + from sympy.matrices import Determinant, Inverse, BlockMatrix, OneMatrix, ZeroMatrix + m = Matrix(((1, 2), (3, 4))) + assert upretty(Determinant(m)) == '│1 2│\n│ │\n│3 4│' + assert upretty(Determinant(Inverse(m))) == \ + '│ -1│\n'\ + '│⎡1 2⎤ │\n'\ + '│⎢ ⎥ │\n'\ + '│⎣3 4⎦ │' + X = MatrixSymbol('X', 2, 2) + assert upretty(Determinant(X)) == '│X│' + assert upretty(Determinant(X + m)) == \ + '│⎡1 2⎤ │\n'\ + '│⎢ ⎥ + X│\n'\ + '│⎣3 4⎦ │' + assert upretty(Determinant(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + '│ 𝟙 X│\n'\ + '│ │\n'\ + '│⎡1 2⎤ │\n'\ + '│⎢ ⎥ 𝟘│\n'\ + '│⎣3 4⎦ │' + + +def test_pretty_piecewise(): + expr = Piecewise((x, x < 1), (x**2, True)) + ascii_str = \ +"""\ +/x for x < 1\n\ +| \n\ +< 2 \n\ +|x otherwise\n\ +\\ \ +""" + ucode_str = \ +"""\ +⎧x for x < 1\n\ +⎪ \n\ +⎨ 2 \n\ +⎪x otherwise\n\ +⎩ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = -Piecewise((x, x < 1), (x**2, True)) + ascii_str = \ +"""\ + //x for x < 1\\\n\ + || |\n\ +-|< 2 |\n\ + ||x otherwise|\n\ + \\\\ /\ +""" + ucode_str = \ +"""\ + ⎛⎧x for x < 1⎞\n\ + ⎜⎪ ⎟\n\ +-⎜⎨ 2 ⎟\n\ + ⎜⎪x otherwise⎟\n\ + ⎝⎩ ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = x + Piecewise((x, x > 0), (y, True)) + Piecewise((x/y, x < 2), + (y**2, x > 2), (1, True)) + 1 + ascii_str = \ +"""\ + //x \\ \n\ + ||- for x < 2| \n\ + ||y | \n\ + //x for x > 0\\ || | \n\ +x + |< | + |< 2 | + 1\n\ + \\\\y otherwise/ ||y for x > 2| \n\ + || | \n\ + ||1 otherwise| \n\ + \\\\ / \ +""" + ucode_str = \ +"""\ + ⎛⎧x ⎞ \n\ + ⎜⎪─ for x < 2⎟ \n\ + ⎜⎪y ⎟ \n\ + ⎛⎧x for x > 0⎞ ⎜⎪ ⎟ \n\ +x + ⎜⎨ ⎟ + ⎜⎨ 2 ⎟ + 1\n\ + ⎝⎩y otherwise⎠ ⎜⎪y for x > 2⎟ \n\ + ⎜⎪ ⎟ \n\ + ⎜⎪1 otherwise⎟ \n\ + ⎝⎩ ⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = x - Piecewise((x, x > 0), (y, True)) + Piecewise((x/y, x < 2), + (y**2, x > 2), (1, True)) + 1 + ascii_str = \ +"""\ + //x \\ \n\ + ||- for x < 2| \n\ + ||y | \n\ + //x for x > 0\\ || | \n\ +x - |< | + |< 2 | + 1\n\ + \\\\y otherwise/ ||y for x > 2| \n\ + || | \n\ + ||1 otherwise| \n\ + \\\\ / \ +""" + ucode_str = \ +"""\ + ⎛⎧x ⎞ \n\ + ⎜⎪─ for x < 2⎟ \n\ + ⎜⎪y ⎟ \n\ + ⎛⎧x for x > 0⎞ ⎜⎪ ⎟ \n\ +x - ⎜⎨ ⎟ + ⎜⎨ 2 ⎟ + 1\n\ + ⎝⎩y otherwise⎠ ⎜⎪y for x > 2⎟ \n\ + ⎜⎪ ⎟ \n\ + ⎜⎪1 otherwise⎟ \n\ + ⎝⎩ ⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = x*Piecewise((x, x > 0), (y, True)) + ascii_str = \ +"""\ + //x for x > 0\\\n\ +x*|< |\n\ + \\\\y otherwise/\ +""" + ucode_str = \ +"""\ + ⎛⎧x for x > 0⎞\n\ +x⋅⎜⎨ ⎟\n\ + ⎝⎩y otherwise⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Piecewise((x, x > 0), (y, True))*Piecewise((x/y, x < 2), (y**2, x > + 2), (1, True)) + ascii_str = \ +"""\ + //x \\\n\ + ||- for x < 2|\n\ + ||y |\n\ +//x for x > 0\\ || |\n\ +|< |*|< 2 |\n\ +\\\\y otherwise/ ||y for x > 2|\n\ + || |\n\ + ||1 otherwise|\n\ + \\\\ /\ +""" + ucode_str = \ +"""\ + ⎛⎧x ⎞\n\ + ⎜⎪─ for x < 2⎟\n\ + ⎜⎪y ⎟\n\ +⎛⎧x for x > 0⎞ ⎜⎪ ⎟\n\ +⎜⎨ ⎟⋅⎜⎨ 2 ⎟\n\ +⎝⎩y otherwise⎠ ⎜⎪y for x > 2⎟\n\ + ⎜⎪ ⎟\n\ + ⎜⎪1 otherwise⎟\n\ + ⎝⎩ ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = -Piecewise((x, x > 0), (y, True))*Piecewise((x/y, x < 2), (y**2, x + > 2), (1, True)) + ascii_str = \ +"""\ + //x \\\n\ + ||- for x < 2|\n\ + ||y |\n\ + //x for x > 0\\ || |\n\ +-|< |*|< 2 |\n\ + \\\\y otherwise/ ||y for x > 2|\n\ + || |\n\ + ||1 otherwise|\n\ + \\\\ /\ +""" + ucode_str = \ +"""\ + ⎛⎧x ⎞\n\ + ⎜⎪─ for x < 2⎟\n\ + ⎜⎪y ⎟\n\ + ⎛⎧x for x > 0⎞ ⎜⎪ ⎟\n\ +-⎜⎨ ⎟⋅⎜⎨ 2 ⎟\n\ + ⎝⎩y otherwise⎠ ⎜⎪y for x > 2⎟\n\ + ⎜⎪ ⎟\n\ + ⎜⎪1 otherwise⎟\n\ + ⎝⎩ ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Piecewise((0, Abs(1/y) < 1), (1, Abs(y) < 1), (y*meijerg(((2, 1), + ()), ((), (1, 0)), 1/y), True)) + ascii_str = \ +"""\ +/ 1 \n\ +| 0 for --- < 1\n\ +| |y| \n\ +| \n\ +< 1 for |y| < 1\n\ +| \n\ +| __0, 2 /1, 2 | 1\\ \n\ +|y*/__ | | -| otherwise \n\ +\\ \\_|2, 2 \\ 0, 1 | y/ \ +""" + ucode_str = \ +"""\ +⎧ 1 \n\ +⎪ 0 for ─── < 1\n\ +⎪ │y│ \n\ +⎪ \n\ +⎨ 1 for │y│ < 1\n\ +⎪ \n\ +⎪ ╭─╮0, 2 ⎛1, 2 │ 1⎞ \n\ +⎪y⋅│╶┐ ⎜ │ ─⎟ otherwise \n\ +⎩ ╰─╯2, 2 ⎝ 0, 1 │ y⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + # XXX: We have to use evaluate=False here because Piecewise._eval_power + # denests the power. + expr = Pow(Piecewise((x, x > 0), (y, True)), 2, evaluate=False) + ascii_str = \ +"""\ + 2\n\ +//x for x > 0\\ \n\ +|< | \n\ +\\\\y otherwise/ \ +""" + ucode_str = \ +"""\ + 2\n\ +⎛⎧x for x > 0⎞ \n\ +⎜⎨ ⎟ \n\ +⎝⎩y otherwise⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_ITE(): + expr = ITE(x, y, z) + assert pretty(expr) == ( + '/y for x \n' + '< \n' + '\\z otherwise' + ) + assert upretty(expr) == """\ +⎧y for x \n\ +⎨ \n\ +⎩z otherwise\ +""" + + +def test_pretty_seq(): + expr = () + ascii_str = \ +"""\ +()\ +""" + ucode_str = \ +"""\ +()\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = [] + ascii_str = \ +"""\ +[]\ +""" + ucode_str = \ +"""\ +[]\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = {} + expr_2 = {} + ascii_str = \ +"""\ +{}\ +""" + ucode_str = \ +"""\ +{}\ +""" + assert pretty(expr) == ascii_str + assert pretty(expr_2) == ascii_str + assert upretty(expr) == ucode_str + assert upretty(expr_2) == ucode_str + + expr = (1/x,) + ascii_str = \ +"""\ + 1 \n\ +(-,)\n\ + x \ +""" + ucode_str = \ +"""\ +⎛1 ⎞\n\ +⎜─,⎟\n\ +⎝x ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = [x**2, 1/x, x, y, sin(th)**2/cos(ph)**2] + ascii_str = \ +"""\ + 2 \n\ + 2 1 sin (theta) \n\ +[x , -, x, y, -----------]\n\ + x 2 \n\ + cos (phi) \ +""" + ucode_str = \ +"""\ +⎡ 2 ⎤\n\ +⎢ 2 1 sin (θ)⎥\n\ +⎢x , ─, x, y, ───────⎥\n\ +⎢ x 2 ⎥\n\ +⎣ cos (φ)⎦\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (x**2, 1/x, x, y, sin(th)**2/cos(ph)**2) + ascii_str = \ +"""\ + 2 \n\ + 2 1 sin (theta) \n\ +(x , -, x, y, -----------)\n\ + x 2 \n\ + cos (phi) \ +""" + ucode_str = \ +"""\ +⎛ 2 ⎞\n\ +⎜ 2 1 sin (θ)⎟\n\ +⎜x , ─, x, y, ───────⎟\n\ +⎜ x 2 ⎟\n\ +⎝ cos (φ)⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Tuple(x**2, 1/x, x, y, sin(th)**2/cos(ph)**2) + ascii_str = \ +"""\ + 2 \n\ + 2 1 sin (theta) \n\ +(x , -, x, y, -----------)\n\ + x 2 \n\ + cos (phi) \ +""" + ucode_str = \ +"""\ +⎛ 2 ⎞\n\ +⎜ 2 1 sin (θ)⎟\n\ +⎜x , ─, x, y, ───────⎟\n\ +⎜ x 2 ⎟\n\ +⎝ cos (φ)⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = {x: sin(x)} + expr_2 = Dict({x: sin(x)}) + ascii_str = \ +"""\ +{x: sin(x)}\ +""" + ucode_str = \ +"""\ +{x: sin(x)}\ +""" + assert pretty(expr) == ascii_str + assert pretty(expr_2) == ascii_str + assert upretty(expr) == ucode_str + assert upretty(expr_2) == ucode_str + + expr = {1/x: 1/y, x: sin(x)**2} + expr_2 = Dict({1/x: 1/y, x: sin(x)**2}) + ascii_str = \ +"""\ + 1 1 2 \n\ +{-: -, x: sin (x)}\n\ + x y \ +""" + ucode_str = \ +"""\ +⎧1 1 2 ⎫\n\ +⎨─: ─, x: sin (x)⎬\n\ +⎩x y ⎭\ +""" + assert pretty(expr) == ascii_str + assert pretty(expr_2) == ascii_str + assert upretty(expr) == ucode_str + assert upretty(expr_2) == ucode_str + + # There used to be a bug with pretty-printing sequences of even height. + expr = [x**2] + ascii_str = \ +"""\ + 2 \n\ +[x ]\ +""" + ucode_str = \ +"""\ +⎡ 2⎤\n\ +⎣x ⎦\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (x**2,) + ascii_str = \ +"""\ + 2 \n\ +(x ,)\ +""" + ucode_str = \ +"""\ +⎛ 2 ⎞\n\ +⎝x ,⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Tuple(x**2) + ascii_str = \ +"""\ + 2 \n\ +(x ,)\ +""" + ucode_str = \ +"""\ +⎛ 2 ⎞\n\ +⎝x ,⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = {x**2: 1} + expr_2 = Dict({x**2: 1}) + ascii_str = \ +"""\ + 2 \n\ +{x : 1}\ +""" + ucode_str = \ +"""\ +⎧ 2 ⎫\n\ +⎨x : 1⎬\n\ +⎩ ⎭\ +""" + assert pretty(expr) == ascii_str + assert pretty(expr_2) == ascii_str + assert upretty(expr) == ucode_str + assert upretty(expr_2) == ucode_str + + +def test_any_object_in_sequence(): + # Cf. issue 5306 + b1 = Basic() + b2 = Basic(Basic()) + + expr = [b2, b1] + assert pretty(expr) == "[Basic(Basic()), Basic()]" + assert upretty(expr) == "[Basic(Basic()), Basic()]" + + expr = {b2, b1} + assert pretty(expr) == "{Basic(), Basic(Basic())}" + assert upretty(expr) == "{Basic(), Basic(Basic())}" + + expr = {b2: b1, b1: b2} + expr2 = Dict({b2: b1, b1: b2}) + assert pretty(expr) == "{Basic(): Basic(Basic()), Basic(Basic()): Basic()}" + assert pretty( + expr2) == "{Basic(): Basic(Basic()), Basic(Basic()): Basic()}" + assert upretty( + expr) == "{Basic(): Basic(Basic()), Basic(Basic()): Basic()}" + assert upretty( + expr2) == "{Basic(): Basic(Basic()), Basic(Basic()): Basic()}" + + +def test_print_builtin_set(): + assert pretty(set()) == 'set()' + assert upretty(set()) == 'set()' + + assert pretty(frozenset()) == 'frozenset()' + assert upretty(frozenset()) == 'frozenset()' + + s1 = {1/x, x} + s2 = frozenset(s1) + + assert pretty(s1) == \ +"""\ + 1 \n\ +{-, x} + x \ +""" + assert upretty(s1) == \ +"""\ +⎧1 ⎫ +⎨─, x⎬ +⎩x ⎭\ +""" + + assert pretty(s2) == \ +"""\ + 1 \n\ +frozenset({-, x}) + x \ +""" + assert upretty(s2) == \ +"""\ + ⎛⎧1 ⎫⎞ +frozenset⎜⎨─, x⎬⎟ + ⎝⎩x ⎭⎠\ +""" + + +def test_pretty_sets(): + s = FiniteSet + assert pretty(s(*[x*y, x**2])) == \ +"""\ + 2 \n\ +{x , x*y}\ +""" + assert pretty(s(*range(1, 6))) == "{1, 2, 3, 4, 5}" + assert pretty(s(*range(1, 13))) == "{1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12}" + + assert pretty({x*y, x**2}) == \ +"""\ + 2 \n\ +{x , x*y}\ +""" + assert pretty(set(range(1, 6))) == "{1, 2, 3, 4, 5}" + assert pretty(set(range(1, 13))) == \ + "{1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12}" + + assert pretty(frozenset([x*y, x**2])) == \ +"""\ + 2 \n\ +frozenset({x , x*y})\ +""" + assert pretty(frozenset(range(1, 6))) == "frozenset({1, 2, 3, 4, 5})" + assert pretty(frozenset(range(1, 13))) == \ + "frozenset({1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12})" + + assert pretty(Range(0, 3, 1)) == '{0, 1, 2}' + + ascii_str = '{0, 1, ..., 29}' + ucode_str = '{0, 1, …, 29}' + assert pretty(Range(0, 30, 1)) == ascii_str + assert upretty(Range(0, 30, 1)) == ucode_str + + ascii_str = '{30, 29, ..., 2}' + ucode_str = '{30, 29, …, 2}' + assert pretty(Range(30, 1, -1)) == ascii_str + assert upretty(Range(30, 1, -1)) == ucode_str + + ascii_str = '{0, 2, ...}' + ucode_str = '{0, 2, …}' + assert pretty(Range(0, oo, 2)) == ascii_str + assert upretty(Range(0, oo, 2)) == ucode_str + + ascii_str = '{..., 2, 0}' + ucode_str = '{…, 2, 0}' + assert pretty(Range(oo, -2, -2)) == ascii_str + assert upretty(Range(oo, -2, -2)) == ucode_str + + ascii_str = '{-2, -3, ...}' + ucode_str = '{-2, -3, …}' + assert pretty(Range(-2, -oo, -1)) == ascii_str + assert upretty(Range(-2, -oo, -1)) == ucode_str + + +def test_pretty_SetExpr(): + iv = Interval(1, 3) + se = SetExpr(iv) + ascii_str = "SetExpr([1, 3])" + ucode_str = "SetExpr([1, 3])" + assert pretty(se) == ascii_str + assert upretty(se) == ucode_str + + +def test_pretty_ImageSet(): + imgset = ImageSet(Lambda((x, y), x + y), {1, 2, 3}, {3, 4}) + ascii_str = '{x + y | x in {1, 2, 3}, y in {3, 4}}' + ucode_str = '{x + y │ x ∊ {1, 2, 3}, y ∊ {3, 4}}' + assert pretty(imgset) == ascii_str + assert upretty(imgset) == ucode_str + + imgset = ImageSet(Lambda(((x, y),), x + y), ProductSet({1, 2, 3}, {3, 4})) + ascii_str = '{x + y | (x, y) in {1, 2, 3} x {3, 4}}' + ucode_str = '{x + y │ (x, y) ∊ {1, 2, 3} × {3, 4}}' + assert pretty(imgset) == ascii_str + assert upretty(imgset) == ucode_str + + imgset = ImageSet(Lambda(x, x**2), S.Naturals) + ascii_str = '''\ + 2 \n\ +{x | x in Naturals}''' + ucode_str = '''\ +⎧ 2 │ ⎫\n\ +⎨x │ x ∊ ℕ⎬\n\ +⎩ │ ⎭''' + assert pretty(imgset) == ascii_str + assert upretty(imgset) == ucode_str + + # TODO: The "x in N" parts below should be centered independently of the + # 1/x**2 fraction + imgset = ImageSet(Lambda(x, 1/x**2), S.Naturals) + ascii_str = '''\ + 1 \n\ +{-- | x in Naturals} + 2 \n\ + x ''' + ucode_str = '''\ +⎧1 │ ⎫\n\ +⎪── │ x ∊ ℕ⎪\n\ +⎨ 2 │ ⎬\n\ +⎪x │ ⎪\n\ +⎩ │ ⎭''' + assert pretty(imgset) == ascii_str + assert upretty(imgset) == ucode_str + + imgset = ImageSet(Lambda((x, y), 1/(x + y)**2), S.Naturals, S.Naturals) + ascii_str = '''\ + 1 \n\ +{-------- | x in Naturals, y in Naturals} + 2 \n\ + (x + y) ''' + ucode_str = '''\ +⎧ 1 │ ⎫ +⎪──────── │ x ∊ ℕ, y ∊ ℕ⎪ +⎨ 2 │ ⎬ +⎪(x + y) │ ⎪ +⎩ │ ⎭''' + assert pretty(imgset) == ascii_str + assert upretty(imgset) == ucode_str + + # issue 23449 centering issue + assert upretty([Symbol("ihat") / (Symbol("i") + 1)]) == '''\ +⎡ î ⎤ +⎢─────⎥ +⎣i + 1⎦\ +''' + assert upretty(Matrix([Symbol("ihat"), Symbol("i") + 1])) == '''\ +⎡ î ⎤ +⎢ ⎥ +⎣i + 1⎦\ +''' + + +def test_pretty_ConditionSet(): + ascii_str = '{x | x in (-oo, oo) and sin(x) = 0}' + ucode_str = '{x │ x ∊ ℝ ∧ (sin(x) = 0)}' + assert pretty(ConditionSet(x, Eq(sin(x), 0), S.Reals)) == ascii_str + assert upretty(ConditionSet(x, Eq(sin(x), 0), S.Reals)) == ucode_str + + assert pretty(ConditionSet(x, Contains(x, S.Reals, evaluate=False), FiniteSet(1))) == '{1}' + assert upretty(ConditionSet(x, Contains(x, S.Reals, evaluate=False), FiniteSet(1))) == '{1}' + + assert pretty(ConditionSet(x, And(x > 1, x < -1), FiniteSet(1, 2, 3))) == "EmptySet" + assert upretty(ConditionSet(x, And(x > 1, x < -1), FiniteSet(1, 2, 3))) == "∅" + + assert pretty(ConditionSet(x, Or(x > 1, x < -1), FiniteSet(1, 2))) == '{2}' + assert upretty(ConditionSet(x, Or(x > 1, x < -1), FiniteSet(1, 2))) == '{2}' + + condset = ConditionSet(x, 1/x**2 > 0) + ascii_str = '''\ + 1 \n\ +{x | -- > 0} + 2 \n\ + x ''' + ucode_str = '''\ +⎧ │ ⎛1 ⎞⎫ +⎪x │ ⎜── > 0⎟⎪ +⎨ │ ⎜ 2 ⎟⎬ +⎪ │ ⎝x ⎠⎪ +⎩ │ ⎭''' + assert pretty(condset) == ascii_str + assert upretty(condset) == ucode_str + + condset = ConditionSet(x, 1/x**2 > 0, S.Reals) + ascii_str = '''\ + 1 \n\ +{x | x in (-oo, oo) and -- > 0} + 2 \n\ + x ''' + ucode_str = '''\ +⎧ │ ⎛1 ⎞⎫ +⎪x │ x ∊ ℝ ∧ ⎜── > 0⎟⎪ +⎨ │ ⎜ 2 ⎟⎬ +⎪ │ ⎝x ⎠⎪ +⎩ │ ⎭''' + assert pretty(condset) == ascii_str + assert upretty(condset) == ucode_str + + +def test_pretty_ComplexRegion(): + from sympy.sets.fancysets import ComplexRegion + cregion = ComplexRegion(Interval(3, 5)*Interval(4, 6)) + ascii_str = '{x + y*I | x, y in [3, 5] x [4, 6]}' + ucode_str = '{x + y⋅ⅈ │ x, y ∊ [3, 5] × [4, 6]}' + assert pretty(cregion) == ascii_str + assert upretty(cregion) == ucode_str + + cregion = ComplexRegion(Interval(0, 1)*Interval(0, 2*pi), polar=True) + ascii_str = '{r*(I*sin(theta) + cos(theta)) | r, theta in [0, 1] x [0, 2*pi)}' + ucode_str = '{r⋅(ⅈ⋅sin(θ) + cos(θ)) │ r, θ ∊ [0, 1] × [0, 2⋅π)}' + assert pretty(cregion) == ascii_str + assert upretty(cregion) == ucode_str + + cregion = ComplexRegion(Interval(3, 1/a**2)*Interval(4, 6)) + ascii_str = '''\ + 1 \n\ +{x + y*I | x, y in [3, --] x [4, 6]} + 2 \n\ + a ''' + ucode_str = '''\ +⎧ │ ⎡ 1 ⎤ ⎫ +⎪x + y⋅ⅈ │ x, y ∊ ⎢3, ──⎥ × [4, 6]⎪ +⎨ │ ⎢ 2⎥ ⎬ +⎪ │ ⎣ a ⎦ ⎪ +⎩ │ ⎭''' + assert pretty(cregion) == ascii_str + assert upretty(cregion) == ucode_str + + cregion = ComplexRegion(Interval(0, 1/a**2)*Interval(0, 2*pi), polar=True) + ascii_str = '''\ + 1 \n\ +{r*(I*sin(theta) + cos(theta)) | r, theta in [0, --] x [0, 2*pi)} + 2 \n\ + a ''' + ucode_str = '''\ +⎧ │ ⎡ 1 ⎤ ⎫ +⎪r⋅(ⅈ⋅sin(θ) + cos(θ)) │ r, θ ∊ ⎢0, ──⎥ × [0, 2⋅π)⎪ +⎨ │ ⎢ 2⎥ ⎬ +⎪ │ ⎣ a ⎦ ⎪ +⎩ │ ⎭''' + assert pretty(cregion) == ascii_str + assert upretty(cregion) == ucode_str + + +def test_pretty_Union_issue_10414(): + a, b = Interval(2, 3), Interval(4, 7) + ucode_str = '[2, 3] ∪ [4, 7]' + ascii_str = '[2, 3] U [4, 7]' + assert upretty(Union(a, b)) == ucode_str + assert pretty(Union(a, b)) == ascii_str + + +def test_pretty_Intersection_issue_10414(): + x, y, z, w = symbols('x, y, z, w') + a, b = Interval(x, y), Interval(z, w) + ucode_str = '[x, y] ∩ [z, w]' + ascii_str = '[x, y] n [z, w]' + assert upretty(Intersection(a, b)) == ucode_str + assert pretty(Intersection(a, b)) == ascii_str + + +def test_ProductSet_exponent(): + ucode_str = ' 1\n[0, 1] ' + assert upretty(Interval(0, 1)**1) == ucode_str + ucode_str = ' 2\n[0, 1] ' + assert upretty(Interval(0, 1)**2) == ucode_str + + +def test_ProductSet_parenthesis(): + ucode_str = '([4, 7] × {1, 2}) ∪ ([2, 3] × [4, 7])' + + a, b = Interval(2, 3), Interval(4, 7) + assert upretty(Union(a*b, b*FiniteSet(1, 2))) == ucode_str + + +def test_ProductSet_prod_char_issue_10413(): + ascii_str = '[2, 3] x [4, 7]' + ucode_str = '[2, 3] × [4, 7]' + + a, b = Interval(2, 3), Interval(4, 7) + assert pretty(a*b) == ascii_str + assert upretty(a*b) == ucode_str + + +def test_pretty_sequences(): + s1 = SeqFormula(a**2, (0, oo)) + s2 = SeqPer((1, 2)) + + ascii_str = '[0, 1, 4, 9, ...]' + ucode_str = '[0, 1, 4, 9, …]' + + assert pretty(s1) == ascii_str + assert upretty(s1) == ucode_str + + ascii_str = '[1, 2, 1, 2, ...]' + ucode_str = '[1, 2, 1, 2, …]' + assert pretty(s2) == ascii_str + assert upretty(s2) == ucode_str + + s3 = SeqFormula(a**2, (0, 2)) + s4 = SeqPer((1, 2), (0, 2)) + + ascii_str = '[0, 1, 4]' + ucode_str = '[0, 1, 4]' + + assert pretty(s3) == ascii_str + assert upretty(s3) == ucode_str + + ascii_str = '[1, 2, 1]' + ucode_str = '[1, 2, 1]' + assert pretty(s4) == ascii_str + assert upretty(s4) == ucode_str + + s5 = SeqFormula(a**2, (-oo, 0)) + s6 = SeqPer((1, 2), (-oo, 0)) + + ascii_str = '[..., 9, 4, 1, 0]' + ucode_str = '[…, 9, 4, 1, 0]' + + assert pretty(s5) == ascii_str + assert upretty(s5) == ucode_str + + ascii_str = '[..., 2, 1, 2, 1]' + ucode_str = '[…, 2, 1, 2, 1]' + assert pretty(s6) == ascii_str + assert upretty(s6) == ucode_str + + ascii_str = '[1, 3, 5, 11, ...]' + ucode_str = '[1, 3, 5, 11, …]' + + assert pretty(SeqAdd(s1, s2)) == ascii_str + assert upretty(SeqAdd(s1, s2)) == ucode_str + + ascii_str = '[1, 3, 5]' + ucode_str = '[1, 3, 5]' + + assert pretty(SeqAdd(s3, s4)) == ascii_str + assert upretty(SeqAdd(s3, s4)) == ucode_str + + ascii_str = '[..., 11, 5, 3, 1]' + ucode_str = '[…, 11, 5, 3, 1]' + + assert pretty(SeqAdd(s5, s6)) == ascii_str + assert upretty(SeqAdd(s5, s6)) == ucode_str + + ascii_str = '[0, 2, 4, 18, ...]' + ucode_str = '[0, 2, 4, 18, …]' + + assert pretty(SeqMul(s1, s2)) == ascii_str + assert upretty(SeqMul(s1, s2)) == ucode_str + + ascii_str = '[0, 2, 4]' + ucode_str = '[0, 2, 4]' + + assert pretty(SeqMul(s3, s4)) == ascii_str + assert upretty(SeqMul(s3, s4)) == ucode_str + + ascii_str = '[..., 18, 4, 2, 0]' + ucode_str = '[…, 18, 4, 2, 0]' + + assert pretty(SeqMul(s5, s6)) == ascii_str + assert upretty(SeqMul(s5, s6)) == ucode_str + + # Sequences with symbolic limits, issue 12629 + s7 = SeqFormula(a**2, (a, 0, x)) + raises(NotImplementedError, lambda: pretty(s7)) + raises(NotImplementedError, lambda: upretty(s7)) + + b = Symbol('b') + s8 = SeqFormula(b*a**2, (a, 0, 2)) + ascii_str = '[0, b, 4*b]' + ucode_str = '[0, b, 4⋅b]' + assert pretty(s8) == ascii_str + assert upretty(s8) == ucode_str + + +def test_pretty_FourierSeries(): + f = fourier_series(x, (x, -pi, pi)) + + ascii_str = \ +"""\ + 2*sin(3*x) \n\ +2*sin(x) - sin(2*x) + ---------- + ...\n\ + 3 \ +""" + + ucode_str = \ +"""\ + 2⋅sin(3⋅x) \n\ +2⋅sin(x) - sin(2⋅x) + ────────── + …\n\ + 3 \ +""" + + assert pretty(f) == ascii_str + assert upretty(f) == ucode_str + + +def test_pretty_FormalPowerSeries(): + f = fps(log(1 + x)) + + + ascii_str = \ +"""\ + oo \n\ +____ \n\ +\\ ` \n\ + \\ -k k \n\ + \\ -(-1) *x \n\ + / -----------\n\ + / k \n\ +/___, \n\ +k = 1 \ +""" + + ucode_str = \ +"""\ + ∞ \n\ +____ \n\ +╲ \n\ + ╲ -k k \n\ + ╲ -(-1) ⋅x \n\ + ╱ ───────────\n\ + ╱ k \n\ +╱ \n\ +‾‾‾‾ \n\ +k = 1 \ +""" + + assert pretty(f) == ascii_str + assert upretty(f) == ucode_str + + +def test_pretty_limits(): + expr = Limit(x, x, oo) + ascii_str = \ +"""\ + lim x\n\ +x->oo \ +""" + ucode_str = \ +"""\ +lim x\n\ +x─→∞ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(x**2, x, 0) + ascii_str = \ +"""\ + 2\n\ + lim x \n\ +x->0+ \ +""" + ucode_str = \ +"""\ + 2\n\ + lim x \n\ +x─→0⁺ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(1/x, x, 0) + ascii_str = \ +"""\ + 1\n\ + lim -\n\ +x->0+x\ +""" + ucode_str = \ +"""\ + 1\n\ + lim ─\n\ +x─→0⁺x\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(sin(x)/x, x, 0) + ascii_str = \ +"""\ + /sin(x)\\\n\ + lim |------|\n\ +x->0+\\ x /\ +""" + ucode_str = \ +"""\ + ⎛sin(x)⎞\n\ + lim ⎜──────⎟\n\ +x─→0⁺⎝ x ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(sin(x)/x, x, 0, "-") + ascii_str = \ +"""\ + /sin(x)\\\n\ + lim |------|\n\ +x->0-\\ x /\ +""" + ucode_str = \ +"""\ + ⎛sin(x)⎞\n\ + lim ⎜──────⎟\n\ +x─→0⁻⎝ x ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(x + sin(x), x, 0) + ascii_str = \ +"""\ + lim (x + sin(x))\n\ +x->0+ \ +""" + ucode_str = \ +"""\ + lim (x + sin(x))\n\ +x─→0⁺ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(x, x, 0)**2 + ascii_str = \ +"""\ + 2\n\ +/ lim x\\ \n\ +\\x->0+ / \ +""" + ucode_str = \ +"""\ + 2\n\ +⎛ lim x⎞ \n\ +⎝x─→0⁺ ⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(x*Limit(y/2,y,0), x, 0) + ascii_str = \ +"""\ + / /y\\\\\n\ + lim |x* lim |-||\n\ +x->0+\\ y->0+\\2//\ +""" + ucode_str = \ +"""\ + ⎛ ⎛y⎞⎞\n\ + lim ⎜x⋅ lim ⎜─⎟⎟\n\ +x─→0⁺⎝ y─→0⁺⎝2⎠⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = 2*Limit(x*Limit(y/2,y,0), x, 0) + ascii_str = \ +"""\ + / /y\\\\\n\ +2* lim |x* lim |-||\n\ + x->0+\\ y->0+\\2//\ +""" + ucode_str = \ +"""\ + ⎛ ⎛y⎞⎞\n\ +2⋅ lim ⎜x⋅ lim ⎜─⎟⎟\n\ + x─→0⁺⎝ y─→0⁺⎝2⎠⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Limit(sin(x), x, 0, dir='+-') + ascii_str = \ +"""\ +lim sin(x)\n\ +x->0 \ +""" + ucode_str = \ +"""\ +lim sin(x)\n\ +x─→0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_ComplexRootOf(): + expr = rootof(x**5 + 11*x - 2, 0) + ascii_str = \ +"""\ + / 5 \\\n\ +CRootOf\\x + 11*x - 2, 0/\ +""" + ucode_str = \ +"""\ + ⎛ 5 ⎞\n\ +CRootOf⎝x + 11⋅x - 2, 0⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_RootSum(): + expr = RootSum(x**5 + 11*x - 2, auto=False) + ascii_str = \ +"""\ + / 5 \\\n\ +RootSum\\x + 11*x - 2/\ +""" + ucode_str = \ +"""\ + ⎛ 5 ⎞\n\ +RootSum⎝x + 11⋅x - 2⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = RootSum(x**5 + 11*x - 2, Lambda(z, exp(z))) + ascii_str = \ +"""\ + / 5 z\\\n\ +RootSum\\x + 11*x - 2, z -> e /\ +""" + ucode_str = \ +"""\ + ⎛ 5 z⎞\n\ +RootSum⎝x + 11⋅x - 2, z ↦ ℯ ⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_GroebnerBasis(): + expr = groebner([], x, y) + + ascii_str = \ +"""\ +GroebnerBasis([], x, y, domain=ZZ, order=lex)\ +""" + ucode_str = \ +"""\ +GroebnerBasis([], x, y, domain=ℤ, order=lex)\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + F = [x**2 - 3*y - x + 1, y**2 - 2*x + y - 1] + expr = groebner(F, x, y, order='grlex') + + ascii_str = \ +"""\ + /[ 2 2 ] \\\n\ +GroebnerBasis\\[x - x - 3*y + 1, y - 2*x + y - 1], x, y, domain=ZZ, order=grlex/\ +""" + ucode_str = \ +"""\ + ⎛⎡ 2 2 ⎤ ⎞\n\ +GroebnerBasis⎝⎣x - x - 3⋅y + 1, y - 2⋅x + y - 1⎦, x, y, domain=ℤ, order=grlex⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = expr.fglm('lex') + + ascii_str = \ +"""\ + /[ 2 4 3 2 ] \\\n\ +GroebnerBasis\\[2*x - y - y + 1, y + 2*y - 3*y - 16*y + 7], x, y, domain=ZZ, order=lex/\ +""" + ucode_str = \ +"""\ + ⎛⎡ 2 4 3 2 ⎤ ⎞\n\ +GroebnerBasis⎝⎣2⋅x - y - y + 1, y + 2⋅y - 3⋅y - 16⋅y + 7⎦, x, y, domain=ℤ, order=lex⎠\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_UniversalSet(): + assert pretty(S.UniversalSet) == "UniversalSet" + assert upretty(S.UniversalSet) == '𝕌' + + +def test_pretty_Boolean(): + expr = Not(x, evaluate=False) + + assert pretty(expr) == "Not(x)" + assert upretty(expr) == "¬x" + + expr = And(x, y) + + assert pretty(expr) == "And(x, y)" + assert upretty(expr) == "x ∧ y" + + expr = Or(x, y) + + assert pretty(expr) == "Or(x, y)" + assert upretty(expr) == "x ∨ y" + + syms = symbols('a:f') + expr = And(*syms) + + assert pretty(expr) == "And(a, b, c, d, e, f)" + assert upretty(expr) == "a ∧ b ∧ c ∧ d ∧ e ∧ f" + + expr = Or(*syms) + + assert pretty(expr) == "Or(a, b, c, d, e, f)" + assert upretty(expr) == "a ∨ b ∨ c ∨ d ∨ e ∨ f" + + expr = Xor(x, y, evaluate=False) + + assert pretty(expr) == "Xor(x, y)" + assert upretty(expr) == "x ⊻ y" + + expr = Nand(x, y, evaluate=False) + + assert pretty(expr) == "Nand(x, y)" + assert upretty(expr) == "x ⊼ y" + + expr = Nor(x, y, evaluate=False) + + assert pretty(expr) == "Nor(x, y)" + assert upretty(expr) == "x ⊽ y" + + expr = Implies(x, y, evaluate=False) + + assert pretty(expr) == "Implies(x, y)" + assert upretty(expr) == "x → y" + + # don't sort args + expr = Implies(y, x, evaluate=False) + + assert pretty(expr) == "Implies(y, x)" + assert upretty(expr) == "y → x" + + expr = Equivalent(x, y, evaluate=False) + + assert pretty(expr) == "Equivalent(x, y)" + assert upretty(expr) == "x ⇔ y" + + expr = Equivalent(y, x, evaluate=False) + + assert pretty(expr) == "Equivalent(x, y)" + assert upretty(expr) == "x ⇔ y" + + +def test_pretty_Domain(): + expr = FF(23) + + assert pretty(expr) == "GF(23)" + assert upretty(expr) == "ℤ₂₃" + + expr = ZZ + + assert pretty(expr) == "ZZ" + assert upretty(expr) == "ℤ" + + expr = QQ + + assert pretty(expr) == "QQ" + assert upretty(expr) == "ℚ" + + expr = RR + + assert pretty(expr) == "RR" + assert upretty(expr) == "ℝ" + + expr = QQ[x] + + assert pretty(expr) == "QQ[x]" + assert upretty(expr) == "ℚ[x]" + + expr = QQ[x, y] + + assert pretty(expr) == "QQ[x, y]" + assert upretty(expr) == "ℚ[x, y]" + + expr = ZZ.frac_field(x) + + assert pretty(expr) == "ZZ(x)" + assert upretty(expr) == "ℤ(x)" + + expr = ZZ.frac_field(x, y) + + assert pretty(expr) == "ZZ(x, y)" + assert upretty(expr) == "ℤ(x, y)" + + expr = QQ.poly_ring(x, y, order=grlex) + + assert pretty(expr) == "QQ[x, y, order=grlex]" + assert upretty(expr) == "ℚ[x, y, order=grlex]" + + expr = QQ.poly_ring(x, y, order=ilex) + + assert pretty(expr) == "QQ[x, y, order=ilex]" + assert upretty(expr) == "ℚ[x, y, order=ilex]" + + +def test_pretty_prec(): + assert xpretty(S("0.3"), full_prec=True, wrap_line=False) == "0.300000000000000" + assert xpretty(S("0.3"), full_prec="auto", wrap_line=False) == "0.300000000000000" + assert xpretty(S("0.3"), full_prec=False, wrap_line=False) == "0.3" + assert xpretty(S("0.3")*x, full_prec=True, use_unicode=False, wrap_line=False) in [ + "0.300000000000000*x", + "x*0.300000000000000" + ] + assert xpretty(S("0.3")*x, full_prec="auto", use_unicode=False, wrap_line=False) in [ + "0.3*x", + "x*0.3" + ] + assert xpretty(S("0.3")*x, full_prec=False, use_unicode=False, wrap_line=False) in [ + "0.3*x", + "x*0.3" + ] + + +def test_pprint(): + import sys + from io import StringIO + fd = StringIO() + sso = sys.stdout + sys.stdout = fd + try: + pprint(pi, use_unicode=False, wrap_line=False) + finally: + sys.stdout = sso + assert fd.getvalue() == 'pi\n' + + +def test_pretty_class(): + """Test that the printer dispatcher correctly handles classes.""" + class C: + pass # C has no .__class__ and this was causing problems + + class D: + pass + + assert pretty( C ) == str( C ) + assert pretty( D ) == str( D ) + + +def test_pretty_no_wrap_line(): + huge_expr = 0 + for i in range(20): + huge_expr += i*sin(i + x) + assert xpretty(huge_expr ).find('\n') != -1 + assert xpretty(huge_expr, wrap_line=False).find('\n') == -1 + + +def test_settings(): + raises(TypeError, lambda: pretty(S(4), method="garbage")) + + +def test_pretty_sum(): + from sympy.abc import x, a, b, k, m, n + + expr = Sum(k**k, (k, 0, n)) + ascii_str = \ +"""\ + n \n\ +___ \n\ +\\ ` \n\ + \\ k\n\ + / k \n\ +/__, \n\ +k = 0 \ +""" + ucode_str = \ +"""\ + n \n\ + ___ \n\ + ╲ \n\ + ╲ k\n\ + ╱ k \n\ + ╱ \n\ + ‾‾‾ \n\ +k = 0 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(k**k, (k, oo, n)) + ascii_str = \ +"""\ + n \n\ + ___ \n\ + \\ ` \n\ + \\ k\n\ + / k \n\ + /__, \n\ +k = oo \ +""" + ucode_str = \ +"""\ + n \n\ + ___ \n\ + ╲ \n\ + ╲ k\n\ + ╱ k \n\ + ╱ \n\ + ‾‾‾ \n\ +k = ∞ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(k**(Integral(x**n, (x, -oo, oo))), (k, 0, n**n)) + ascii_str = \ +"""\ + n \n\ + n \n\ +______ \n\ +\\ ` \n\ + \\ oo \n\ + \\ / \n\ + \\ | \n\ + \\ | n \n\ + ) | x dx\n\ + / | \n\ + / / \n\ + / -oo \n\ + / k \n\ +/_____, \n\ + k = 0 \ +""" + ucode_str = \ +"""\ + n \n\ + n \n\ +______ \n\ +╲ \n\ + ╲ \n\ + ╲ ∞ \n\ + ╲ ⌠ \n\ + ╲ ⎮ n \n\ + ╱ ⎮ x dx\n\ + ╱ ⌡ \n\ + ╱ -∞ \n\ + ╱ k \n\ +╱ \n\ +‾‾‾‾‾‾ \n\ +k = 0 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(k**( + Integral(x**n, (x, -oo, oo))), (k, 0, Integral(x**x, (x, -oo, oo)))) + ascii_str = \ +"""\ + oo \n\ + / \n\ + | \n\ + | x \n\ + | x dx \n\ + | \n\ +/ \n\ +-oo \n\ + ______ \n\ + \\ ` \n\ + \\ oo \n\ + \\ / \n\ + \\ | \n\ + \\ | n \n\ + ) | x dx\n\ + / | \n\ + / / \n\ + / -oo \n\ + / k \n\ + /_____, \n\ + k = 0 \ +""" + ucode_str = \ +"""\ +∞ \n\ +⌠ \n\ +⎮ x \n\ +⎮ x dx \n\ +⌡ \n\ +-∞ \n\ + ______ \n\ + ╲ \n\ + ╲ \n\ + ╲ ∞ \n\ + ╲ ⌠ \n\ + ╲ ⎮ n \n\ + ╱ ⎮ x dx\n\ + ╱ ⌡ \n\ + ╱ -∞ \n\ + ╱ k \n\ + ╱ \n\ + ‾‾‾‾‾‾ \n\ + k = 0 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(k**(Integral(x**n, (x, -oo, oo))), ( + k, x + n + x**2 + n**2 + (x/n) + (1/x), Integral(x**x, (x, -oo, oo)))) + ascii_str = \ +"""\ + oo \n\ + / \n\ + | \n\ + | x \n\ + | x dx \n\ + | \n\ + / \n\ + -oo \n\ + ______ \n\ + \\ ` \n\ + \\ oo \n\ + \\ / \n\ + \\ | \n\ + \\ | n \n\ + ) | x dx\n\ + / | \n\ + / / \n\ + / -oo \n\ + / k \n\ + /_____, \n\ + 2 2 1 x \n\ +k = n + n + x + x + - + - \n\ + x n \ +""" + ucode_str = \ +"""\ + ∞ \n\ + ⌠ \n\ + ⎮ x \n\ + ⎮ x dx \n\ + ⌡ \n\ + -∞ \n\ + ______ \n\ + ╲ \n\ + ╲ \n\ + ╲ ∞ \n\ + ╲ ⌠ \n\ + ╲ ⎮ n \n\ + ╱ ⎮ x dx\n\ + ╱ ⌡ \n\ + ╱ -∞ \n\ + ╱ k \n\ + ╱ \n\ + ‾‾‾‾‾‾ \n\ + 2 2 1 x \n\ +k = n + n + x + x + ─ + ─ \n\ + x n \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(k**( + Integral(x**n, (x, -oo, oo))), (k, 0, x + n + x**2 + n**2 + (x/n) + (1/x))) + ascii_str = \ +"""\ + 2 2 1 x \n\ +n + n + x + x + - + - \n\ + x n \n\ + ______ \n\ + \\ ` \n\ + \\ oo \n\ + \\ / \n\ + \\ | \n\ + \\ | n \n\ + ) | x dx\n\ + / | \n\ + / / \n\ + / -oo \n\ + / k \n\ + /_____, \n\ + k = 0 \ +""" + ucode_str = \ +"""\ + 2 2 1 x \n\ +n + n + x + x + ─ + ─ \n\ + x n \n\ + ______ \n\ + ╲ \n\ + ╲ \n\ + ╲ ∞ \n\ + ╲ ⌠ \n\ + ╲ ⎮ n \n\ + ╱ ⎮ x dx\n\ + ╱ ⌡ \n\ + ╱ -∞ \n\ + ╱ k \n\ + ╱ \n\ + ‾‾‾‾‾‾ \n\ + k = 0 \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(x, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ + __ \n\ + \\ ` \n\ + ) x\n\ + /_, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ + ___ \n\ + ╲ \n\ + ╲ \n\ + ╱ x\n\ + ╱ \n\ + ‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(x**2, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +___ \n\ +\\ ` \n\ + \\ 2\n\ + / x \n\ +/__, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ + ___ \n\ + ╲ \n\ + ╲ 2\n\ + ╱ x \n\ + ╱ \n\ + ‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(x/2, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +___ \n\ +\\ ` \n\ + \\ x\n\ + ) -\n\ + / 2\n\ +/__, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ +____ \n\ +╲ \n\ + ╲ \n\ + ╲ x\n\ + ╱ ─\n\ + ╱ 2\n\ +╱ \n\ +‾‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(x**3/2, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +____ \n\ +\\ ` \n\ + \\ 3\n\ + \\ x \n\ + / --\n\ + / 2 \n\ +/___, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ +____ \n\ +╲ \n\ + ╲ 3\n\ + ╲ x \n\ + ╱ ──\n\ + ╱ 2 \n\ +╱ \n\ +‾‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum((x**3*y**(x/2))**n, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +____ \n\ +\\ ` \n\ + \\ n\n\ + \\ / x\\ \n\ + ) | -| \n\ + / | 3 2| \n\ + / \\x *y / \n\ +/___, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ +_____ \n\ +╲ \n\ + ╲ \n\ + ╲ n\n\ + ╲ ⎛ x⎞ \n\ + ╱ ⎜ ─⎟ \n\ + ╱ ⎜ 3 2⎟ \n\ + ╱ ⎝x ⋅y ⎠ \n\ +╱ \n\ +‾‾‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(1/x**2, (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +____ \n\ +\\ ` \n\ + \\ 1 \n\ + \\ --\n\ + / 2\n\ + / x \n\ +/___, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ +____ \n\ +╲ \n\ + ╲ 1 \n\ + ╲ ──\n\ + ╱ 2\n\ + ╱ x \n\ +╱ \n\ +‾‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(1/y**(a/b), (x, 0, oo)) + ascii_str = \ +"""\ + oo \n\ +____ \n\ +\\ ` \n\ + \\ -a \n\ + \\ ---\n\ + / b \n\ + / y \n\ +/___, \n\ +x = 0 \ +""" + ucode_str = \ +"""\ + ∞ \n\ +____ \n\ +╲ \n\ + ╲ -a \n\ + ╲ ───\n\ + ╱ b \n\ + ╱ y \n\ +╱ \n\ +‾‾‾‾ \n\ +x = 0 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Sum(1/y**(a/b), (x, 0, oo), (y, 1, 2)) + ascii_str = \ +"""\ + 2 oo \n\ +____ ____ \n\ +\\ ` \\ ` \n\ + \\ \\ -a\n\ + \\ \\ --\n\ + / / b \n\ + / / y \n\ +/___, /___, \n\ +y = 1 x = 0 \ +""" + ucode_str = \ +"""\ + 2 ∞ \n\ +____ ____ \n\ +╲ ╲ \n\ + ╲ ╲ -a\n\ + ╲ ╲ ──\n\ + ╱ ╱ b \n\ + ╱ ╱ y \n\ +╱ ╱ \n\ +‾‾‾‾ ‾‾‾‾ \n\ +y = 1 x = 0 \ +""" + expr = Sum(1/(1 + 1/( + 1 + 1/k)) + 1, (k, 111, 1 + 1/n), (k, 1/(1 + m), oo)) + 1/(1 + 1/k) + ascii_str = \ +"""\ + 1 \n\ + 1 + - \n\ + oo n \n\ + _____ _____ \n\ + \\ ` \\ ` \n\ + \\ \\ / 1 \\ \n\ + \\ \\ |1 + ---------| \n\ + \\ \\ | 1 | 1 \n\ + ) ) | 1 + -----| + -----\n\ + / / | 1| 1\n\ + / / | 1 + -| 1 + -\n\ + / / \\ k/ k\n\ + /____, /____, \n\ + 1 k = 111 \n\ +k = ----- \n\ + m + 1 \ +""" + ucode_str = \ +"""\ + 1 \n\ + 1 + ─ \n\ + ∞ n \n\ + ______ ______ \n\ + ╲ ╲ \n\ + ╲ ╲ \n\ + ╲ ╲ ⎛ 1 ⎞ \n\ + ╲ ╲ ⎜1 + ─────────⎟ \n\ + ╲ ╲ ⎜ 1 ⎟ 1 \n\ + ╱ ╱ ⎜ 1 + ─────⎟ + ─────\n\ + ╱ ╱ ⎜ 1⎟ 1\n\ + ╱ ╱ ⎜ 1 + ─⎟ 1 + ─\n\ + ╱ ╱ ⎝ k⎠ k\n\ + ╱ ╱ \n\ + ‾‾‾‾‾‾ ‾‾‾‾‾‾ \n\ + 1 k = 111 \n\ +k = ───── \n\ + m + 1 \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_units(): + expr = joule + ascii_str1 = \ +"""\ + 2\n\ +kilogram*meter \n\ +---------------\n\ + 2 \n\ + second \ +""" + unicode_str1 = \ +"""\ + 2\n\ +kilogram⋅meter \n\ +───────────────\n\ + 2 \n\ + second \ +""" + + ascii_str2 = \ +"""\ + 2\n\ +3*x*y*kilogram*meter \n\ +---------------------\n\ + 2 \n\ + second \ +""" + unicode_str2 = \ +"""\ + 2\n\ +3⋅x⋅y⋅kilogram⋅meter \n\ +─────────────────────\n\ + 2 \n\ + second \ +""" + + from sympy.physics.units import kg, m, s + assert upretty(expr) == "joule" + assert pretty(expr) == "joule" + assert upretty(expr.convert_to(kg*m**2/s**2)) == unicode_str1 + assert pretty(expr.convert_to(kg*m**2/s**2)) == ascii_str1 + assert upretty(3*kg*x*m**2*y/s**2) == unicode_str2 + assert pretty(3*kg*x*m**2*y/s**2) == ascii_str2 + + +def test_pretty_Subs(): + f = Function('f') + expr = Subs(f(x), x, ph**2) + ascii_str = \ +"""\ +(f(x))| 2\n\ + |x=phi \ +""" + unicode_str = \ +"""\ +(f(x))│ 2\n\ + │x=φ \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + + expr = Subs(f(x).diff(x), x, 0) + ascii_str = \ +"""\ +/d \\| \n\ +|--(f(x))|| \n\ +\\dx /|x=0\ +""" + unicode_str = \ +"""\ +⎛d ⎞│ \n\ +⎜──(f(x))⎟│ \n\ +⎝dx ⎠│x=0\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + + expr = Subs(f(x).diff(x)/y, (x, y), (0, Rational(1, 2))) + ascii_str = \ +"""\ +/d \\| \n\ +|--(f(x))|| \n\ +|dx || \n\ +|--------|| \n\ +\\ y /|x=0, y=1/2\ +""" + unicode_str = \ +"""\ +⎛d ⎞│ \n\ +⎜──(f(x))⎟│ \n\ +⎜dx ⎟│ \n\ +⎜────────⎟│ \n\ +⎝ y ⎠│x=0, y=1/2\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == unicode_str + + +def test_gammas(): + assert upretty(lowergamma(x, y)) == "γ(x, y)" + assert upretty(uppergamma(x, y)) == "Γ(x, y)" + assert xpretty(gamma(x), use_unicode=True) == 'Γ(x)' + assert xpretty(gamma, use_unicode=True) == 'Γ' + assert xpretty(symbols('gamma', cls=Function)(x), use_unicode=True) == 'γ(x)' + assert xpretty(symbols('gamma', cls=Function), use_unicode=True) == 'γ' + + +def test_beta(): + assert xpretty(beta(x,y), use_unicode=True) == 'Β(x, y)' + assert xpretty(beta(x,y), use_unicode=False) == 'B(x, y)' + assert xpretty(beta, use_unicode=True) == 'Β' + assert xpretty(beta, use_unicode=False) == 'B' + mybeta = Function('beta') + assert xpretty(mybeta(x), use_unicode=True) == 'β(x)' + assert xpretty(mybeta(x, y, z), use_unicode=False) == 'beta(x, y, z)' + assert xpretty(mybeta, use_unicode=True) == 'β' + + +# test that notation passes to subclasses of the same name only +def test_function_subclass_different_name(): + class mygamma(gamma): + pass + assert xpretty(mygamma, use_unicode=True) == r"mygamma" + assert xpretty(mygamma(x), use_unicode=True) == r"mygamma(x)" + + +def test_SingularityFunction(): + assert xpretty(SingularityFunction(x, 0, n), use_unicode=True) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, 1, n), use_unicode=True) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, -1, n), use_unicode=True) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, a, n), use_unicode=True) == ( +"""\ + n\n\ +<-a + x> \ +""") + assert xpretty(SingularityFunction(x, y, n), use_unicode=True) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, 0, n), use_unicode=False) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, 1, n), use_unicode=False) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, -1, n), use_unicode=False) == ( +"""\ + n\n\ + \ +""") + assert xpretty(SingularityFunction(x, a, n), use_unicode=False) == ( +"""\ + n\n\ +<-a + x> \ +""") + assert xpretty(SingularityFunction(x, y, n), use_unicode=False) == ( +"""\ + n\n\ + \ +""") + + +def test_deltas(): + assert xpretty(DiracDelta(x), use_unicode=True) == 'δ(x)' + assert xpretty(DiracDelta(x, 1), use_unicode=True) == \ +"""\ + (1) \n\ +δ (x)\ +""" + assert xpretty(x*DiracDelta(x, 1), use_unicode=True) == \ +"""\ + (1) \n\ +x⋅δ (x)\ +""" + + +def test_hyper(): + expr = hyper((), (), z) + ucode_str = \ +"""\ + ┌─ ⎛ │ ⎞\n\ + ├─ ⎜ │ z⎟\n\ +0╵ 0 ⎝ │ ⎠\ +""" + ascii_str = \ +"""\ + _ \n\ + |_ / | \\\n\ + | | | z|\n\ +0 0 \\ | /\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hyper((), (1,), x) + ucode_str = \ +"""\ + ┌─ ⎛ │ ⎞\n\ + ├─ ⎜ │ x⎟\n\ +0╵ 1 ⎝1 │ ⎠\ +""" + ascii_str = \ +"""\ + _ \n\ + |_ / | \\\n\ + | | | x|\n\ +0 1 \\1 | /\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hyper([2], [1], x) + ucode_str = \ +"""\ + ┌─ ⎛2 │ ⎞\n\ + ├─ ⎜ │ x⎟\n\ +1╵ 1 ⎝1 │ ⎠\ +""" + ascii_str = \ +"""\ + _ \n\ + |_ /2 | \\\n\ + | | | x|\n\ +1 1 \\1 | /\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hyper((pi/3, -2*k), (3, 4, 5, -3), x) + ucode_str = \ +"""\ + ⎛ π │ ⎞\n\ + ┌─ ⎜ ─, -2⋅k │ ⎟\n\ + ├─ ⎜ 3 │ x⎟\n\ +2╵ 4 ⎜ │ ⎟\n\ + ⎝-3, 3, 4, 5 │ ⎠\ +""" + ascii_str = \ +"""\ + \n\ + _ / pi | \\\n\ + |_ | --, -2*k | |\n\ + | | 3 | x|\n\ +2 4 | | |\n\ + \\-3, 3, 4, 5 | /\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hyper((pi, S('2/3'), -2*k), (3, 4, 5, -3), x**2) + ucode_str = \ +"""\ + ┌─ ⎛2/3, π, -2⋅k │ 2⎞\n\ + ├─ ⎜ │ x ⎟\n\ +3╵ 4 ⎝-3, 3, 4, 5 │ ⎠\ +""" + ascii_str = \ +"""\ + _ \n\ + |_ /2/3, pi, -2*k | 2\\ + | | | x | +3 4 \\ -3, 3, 4, 5 | /""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hyper([1, 2], [3, 4], 1/(1/(1/(1/x + 1) + 1) + 1)) + ucode_str = \ +"""\ + ⎛ │ 1 ⎞\n\ + ⎜ │ ─────────────⎟\n\ + ⎜ │ 1 ⎟\n\ + ┌─ ⎜1, 2 │ 1 + ─────────⎟\n\ + ├─ ⎜ │ 1 ⎟\n\ +2╵ 2 ⎜3, 4 │ 1 + ─────⎟\n\ + ⎜ │ 1⎟\n\ + ⎜ │ 1 + ─⎟\n\ + ⎝ │ x⎠\ +""" + + ascii_str = \ +"""\ + \n\ + / | 1 \\\n\ + | | -------------|\n\ + _ | | 1 |\n\ + |_ |1, 2 | 1 + ---------|\n\ + | | | 1 |\n\ +2 2 |3, 4 | 1 + -----|\n\ + | | 1|\n\ + | | 1 + -|\n\ + \\ | x/\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_meijerg(): + expr = meijerg([pi, pi, x], [1], [0, 1], [1, 2, 3], z) + ucode_str = \ +"""\ +╭─╮2, 3 ⎛π, π, x 1 │ ⎞\n\ +│╶┐ ⎜ │ z⎟\n\ +╰─╯4, 5 ⎝ 0, 1 1, 2, 3 │ ⎠\ +""" + ascii_str = \ +"""\ + __2, 3 /pi, pi, x 1 | \\\n\ +/__ | | z|\n\ +\\_|4, 5 \\ 0, 1 1, 2, 3 | /\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = meijerg([1, pi/7], [2, pi, 5], [], [], z**2) + ucode_str = \ +"""\ + ⎛ π │ ⎞\n\ +╭─╮0, 2 ⎜1, ─ 2, 5, π │ 2⎟\n\ +│╶┐ ⎜ 7 │ z ⎟\n\ +╰─╯5, 0 ⎜ │ ⎟\n\ + ⎝ │ ⎠\ +""" + ascii_str = \ +"""\ + / pi | \\\n\ + __0, 2 |1, -- 2, 5, pi | 2|\n\ +/__ | 7 | z |\n\ +\\_|5, 0 | | |\n\ + \\ | /\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ucode_str = \ +"""\ +╭─╮ 1, 10 ⎛1, 1, 1, 1, 1, 1, 1, 1, 1, 1 1 │ ⎞\n\ +│╶┐ ⎜ │ z⎟\n\ +╰─╯11, 2 ⎝ 1 1 │ ⎠\ +""" + ascii_str = \ +"""\ + __ 1, 10 /1, 1, 1, 1, 1, 1, 1, 1, 1, 1 1 | \\\n\ +/__ | | z|\n\ +\\_|11, 2 \\ 1 1 | /\ +""" + + expr = meijerg([1]*10, [1], [1], [1], z) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = meijerg([1, 2, ], [4, 3], [3], [4, 5], 1/(1/(1/(1/x + 1) + 1) + 1)) + + ucode_str = \ +"""\ + ⎛ │ 1 ⎞\n\ + ⎜ │ ─────────────⎟\n\ + ⎜ │ 1 ⎟\n\ +╭─╮1, 2 ⎜1, 2 3, 4 │ 1 + ─────────⎟\n\ +│╶┐ ⎜ │ 1 ⎟\n\ +╰─╯4, 3 ⎜ 3 4, 5 │ 1 + ─────⎟\n\ + ⎜ │ 1⎟\n\ + ⎜ │ 1 + ─⎟\n\ + ⎝ │ x⎠\ +""" + + ascii_str = \ +"""\ + / | 1 \\\n\ + | | -------------|\n\ + | | 1 |\n\ + __1, 2 |1, 2 3, 4 | 1 + ---------|\n\ +/__ | | 1 |\n\ +\\_|4, 3 | 3 4, 5 | 1 + -----|\n\ + | | 1|\n\ + | | 1 + -|\n\ + \\ | x/\ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = Integral(expr, x) + + ucode_str = \ +"""\ +⌠ \n\ +⎮ ⎛ │ 1 ⎞ \n\ +⎮ ⎜ │ ─────────────⎟ \n\ +⎮ ⎜ │ 1 ⎟ \n\ +⎮ ╭─╮1, 2 ⎜1, 2 3, 4 │ 1 + ─────────⎟ \n\ +⎮ │╶┐ ⎜ │ 1 ⎟ dx\n\ +⎮ ╰─╯4, 3 ⎜ 3 4, 5 │ 1 + ─────⎟ \n\ +⎮ ⎜ │ 1⎟ \n\ +⎮ ⎜ │ 1 + ─⎟ \n\ +⎮ ⎝ │ x⎠ \n\ +⌡ \ +""" + + ascii_str = \ +"""\ + / \n\ + | \n\ + | / | 1 \\ \n\ + | | | -------------| \n\ + | | | 1 | \n\ + | __1, 2 |1, 2 3, 4 | 1 + ---------| \n\ + | /__ | | 1 | dx\n\ + | \\_|4, 3 | 3 4, 5 | 1 + -----| \n\ + | | | 1| \n\ + | | | 1 + -| \n\ + | \\ | x/ \n\ + | \n\ +/ \ +""" + + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_noncommutative(): + A, B, C = symbols('A,B,C', commutative=False) + + expr = A*B*C**-1 + ascii_str = \ +"""\ + -1\n\ +A*B*C \ +""" + ucode_str = \ +"""\ + -1\n\ +A⋅B⋅C \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = C**-1*A*B + ascii_str = \ +"""\ + -1 \n\ +C *A*B\ +""" + ucode_str = \ +"""\ + -1 \n\ +C ⋅A⋅B\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A*C**-1*B + ascii_str = \ +"""\ + -1 \n\ +A*C *B\ +""" + ucode_str = \ +"""\ + -1 \n\ +A⋅C ⋅B\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A*C**-1*B/x + ascii_str = \ +"""\ + -1 \n\ +A*C *B\n\ +-------\n\ + x \ +""" + ucode_str = \ +"""\ + -1 \n\ +A⋅C ⋅B\n\ +───────\n\ + x \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_special_functions(): + x, y = symbols("x y") + + # atan2 + expr = atan2(y/sqrt(200), sqrt(x)) + ascii_str = \ +"""\ + / ___ \\\n\ + |\\/ 2 *y ___|\n\ +atan2|-------, \\/ x |\n\ + \\ 20 /\ +""" + ucode_str = \ +"""\ + ⎛√2⋅y ⎞\n\ +atan2⎜────, √x⎟\n\ + ⎝ 20 ⎠\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_geometry(): + e = Segment((0, 1), (0, 2)) + assert pretty(e) == 'Segment2D(Point2D(0, 1), Point2D(0, 2))' + e = Ray((1, 1), angle=4.02*pi) + assert pretty(e) == 'Ray2D(Point2D(1, 1), Point2D(2, tan(pi/50) + 1))' + + +def test_expint(): + expr = Ei(x) + string = 'Ei(x)' + assert pretty(expr) == string + assert upretty(expr) == string + + expr = expint(1, z) + ucode_str = "E₁(z)" + ascii_str = "expint(1, z)" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + assert pretty(Shi(x)) == 'Shi(x)' + assert pretty(Si(x)) == 'Si(x)' + assert pretty(Ci(x)) == 'Ci(x)' + assert pretty(Chi(x)) == 'Chi(x)' + assert upretty(Shi(x)) == 'Shi(x)' + assert upretty(Si(x)) == 'Si(x)' + assert upretty(Ci(x)) == 'Ci(x)' + assert upretty(Chi(x)) == 'Chi(x)' + + +def test_elliptic_functions(): + ascii_str = \ +"""\ + / 1 \\\n\ +K|-----|\n\ + \\z + 1/\ +""" + ucode_str = \ +"""\ + ⎛ 1 ⎞\n\ +K⎜─────⎟\n\ + ⎝z + 1⎠\ +""" + expr = elliptic_k(1/(z + 1)) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ascii_str = \ +"""\ + / | 1 \\\n\ +F|1|-----|\n\ + \\ |z + 1/\ +""" + ucode_str = \ +"""\ + ⎛ │ 1 ⎞\n\ +F⎜1│─────⎟\n\ + ⎝ │z + 1⎠\ +""" + expr = elliptic_f(1, 1/(1 + z)) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ascii_str = \ +"""\ + / 1 \\\n\ +E|-----|\n\ + \\z + 1/\ +""" + ucode_str = \ +"""\ + ⎛ 1 ⎞\n\ +E⎜─────⎟\n\ + ⎝z + 1⎠\ +""" + expr = elliptic_e(1/(z + 1)) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ascii_str = \ +"""\ + / | 1 \\\n\ +E|1|-----|\n\ + \\ |z + 1/\ +""" + ucode_str = \ +"""\ + ⎛ │ 1 ⎞\n\ +E⎜1│─────⎟\n\ + ⎝ │z + 1⎠\ +""" + expr = elliptic_e(1, 1/(1 + z)) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ascii_str = \ +"""\ + / |4\\\n\ +Pi|3|-|\n\ + \\ |x/\ +""" + ucode_str = \ +"""\ + ⎛ │4⎞\n\ +Π⎜3│─⎟\n\ + ⎝ │x⎠\ +""" + expr = elliptic_pi(3, 4/x) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + ascii_str = \ +"""\ + / 4| \\\n\ +Pi|3; -|6|\n\ + \\ x| /\ +""" + ucode_str = \ +"""\ + ⎛ 4│ ⎞\n\ +Π⎜3; ─│6⎟\n\ + ⎝ x│ ⎠\ +""" + expr = elliptic_pi(3, 4/x, 6) + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_RandomDomain(): + from sympy.stats import Normal, Die, Exponential, pspace, where + X = Normal('x1', 0, 1) + assert upretty(where(X > 0)) == "Domain: 0 < x₁ ∧ x₁ < ∞" + + D = Die('d1', 6) + assert upretty(where(D > 4)) == 'Domain: d₁ = 5 ∨ d₁ = 6' + + A = Exponential('a', 1) + B = Exponential('b', 1) + assert upretty(pspace(Tuple(A, B)).domain) == \ + 'Domain: 0 ≤ a ∧ 0 ≤ b ∧ a < ∞ ∧ b < ∞' + + +def test_PrettyPoly(): + F = QQ.frac_field(x, y) + R = QQ.poly_ring(x, y) + + expr = F.convert(x/(x + y)) + assert pretty(expr) == "x/(x + y)" + assert upretty(expr) == "x/(x + y)" + + expr = R.convert(x + y) + assert pretty(expr) == "x + y" + assert upretty(expr) == "x + y" + + +def test_issue_6285(): + assert pretty(Pow(2, -5, evaluate=False)) == '1 \n--\n 5\n2 ' + assert pretty(Pow(x, (1/pi))) == \ + ' 1 \n'\ + ' --\n'\ + ' pi\n'\ + 'x ' + + +def test_issue_6359(): + assert pretty(Integral(x**2, x)**2) == \ +"""\ + 2 +/ / \\ \n\ +| | | \n\ +| | 2 | \n\ +| | x dx| \n\ +| | | \n\ +\\/ / \ +""" + assert upretty(Integral(x**2, x)**2) == \ +"""\ + 2 +⎛⌠ ⎞ \n\ +⎜⎮ 2 ⎟ \n\ +⎜⎮ x dx⎟ \n\ +⎝⌡ ⎠ \ +""" + + assert pretty(Sum(x**2, (x, 0, 1))**2) == \ +"""\ + 2\n\ +/ 1 \\ \n\ +|___ | \n\ +|\\ ` | \n\ +| \\ 2| \n\ +| / x | \n\ +|/__, | \n\ +\\x = 0 / \ +""" + assert upretty(Sum(x**2, (x, 0, 1))**2) == \ +"""\ + 2 +⎛ 1 ⎞ \n\ +⎜ ___ ⎟ \n\ +⎜ ╲ ⎟ \n\ +⎜ ╲ 2⎟ \n\ +⎜ ╱ x ⎟ \n\ +⎜ ╱ ⎟ \n\ +⎜ ‾‾‾ ⎟ \n\ +⎝x = 0 ⎠ \ +""" + + assert pretty(Product(x**2, (x, 1, 2))**2) == \ +"""\ + 2 +/ 2 \\ \n\ +|______ | \n\ +| | | 2| \n\ +| | | x | \n\ +| | | | \n\ +\\x = 1 / \ +""" + assert upretty(Product(x**2, (x, 1, 2))**2) == \ +"""\ + 2 +⎛ 2 ⎞ \n\ +⎜─┬──┬─ ⎟ \n\ +⎜ │ │ 2⎟ \n\ +⎜ │ │ x ⎟ \n\ +⎜ │ │ ⎟ \n\ +⎝x = 1 ⎠ \ +""" + + f = Function('f') + assert pretty(Derivative(f(x), x)**2) == \ +"""\ + 2 +/d \\ \n\ +|--(f(x))| \n\ +\\dx / \ +""" + assert upretty(Derivative(f(x), x)**2) == \ +"""\ + 2 +⎛d ⎞ \n\ +⎜──(f(x))⎟ \n\ +⎝dx ⎠ \ +""" + + +def test_issue_6739(): + ascii_str = \ +"""\ + 1 \n\ +-----\n\ + ___\n\ +\\/ x \ +""" + ucode_str = \ +"""\ +1 \n\ +──\n\ +√x\ +""" + assert pretty(1/sqrt(x)) == ascii_str + assert upretty(1/sqrt(x)) == ucode_str + + +def test_complicated_symbol_unchanged(): + for symb_name in ["dexpr2_d1tau", "dexpr2^d1tau"]: + assert pretty(Symbol(symb_name)) == symb_name + + +def test_categories(): + from sympy.categories import (Object, IdentityMorphism, + NamedMorphism, Category, Diagram, DiagramGrid) + + A1 = Object("A1") + A2 = Object("A2") + A3 = Object("A3") + + f1 = NamedMorphism(A1, A2, "f1") + f2 = NamedMorphism(A2, A3, "f2") + id_A1 = IdentityMorphism(A1) + + K1 = Category("K1") + + assert pretty(A1) == "A1" + assert upretty(A1) == "A₁" + + assert pretty(f1) == "f1:A1-->A2" + assert upretty(f1) == "f₁:A₁——▶A₂" + assert pretty(id_A1) == "id:A1-->A1" + assert upretty(id_A1) == "id:A₁——▶A₁" + + assert pretty(f2*f1) == "f2*f1:A1-->A3" + assert upretty(f2*f1) == "f₂∘f₁:A₁——▶A₃" + + assert pretty(K1) == "K1" + assert upretty(K1) == "K₁" + + # Test how diagrams are printed. + d = Diagram() + assert pretty(d) == "EmptySet" + assert upretty(d) == "∅" + + d = Diagram({f1: "unique", f2: S.EmptySet}) + assert pretty(d) == "{f2*f1:A1-->A3: EmptySet, id:A1-->A1: " \ + "EmptySet, id:A2-->A2: EmptySet, id:A3-->A3: " \ + "EmptySet, f1:A1-->A2: {unique}, f2:A2-->A3: EmptySet}" + + assert upretty(d) == "{f₂∘f₁:A₁——▶A₃: ∅, id:A₁——▶A₁: ∅, " \ + "id:A₂——▶A₂: ∅, id:A₃——▶A₃: ∅, f₁:A₁——▶A₂: {unique}, f₂:A₂——▶A₃: ∅}" + + d = Diagram({f1: "unique", f2: S.EmptySet}, {f2 * f1: "unique"}) + assert pretty(d) == "{f2*f1:A1-->A3: EmptySet, id:A1-->A1: " \ + "EmptySet, id:A2-->A2: EmptySet, id:A3-->A3: " \ + "EmptySet, f1:A1-->A2: {unique}, f2:A2-->A3: EmptySet}" \ + " ==> {f2*f1:A1-->A3: {unique}}" + assert upretty(d) == "{f₂∘f₁:A₁——▶A₃: ∅, id:A₁——▶A₁: ∅, id:A₂——▶A₂: " \ + "∅, id:A₃——▶A₃: ∅, f₁:A₁——▶A₂: {unique}, f₂:A₂——▶A₃: ∅}" \ + " ══▶ {f₂∘f₁:A₁——▶A₃: {unique}}" + + grid = DiagramGrid(d) + assert pretty(grid) == "A1 A2\n \nA3 " + assert upretty(grid) == "A₁ A₂\n \nA₃ " + + +def test_PrettyModules(): + R = QQ.old_poly_ring(x, y) + F = R.free_module(2) + M = F.submodule([x, y], [1, x**2]) + + ucode_str = \ +"""\ + 2\n\ +ℚ[x, y] \ +""" + ascii_str = \ +"""\ + 2\n\ +QQ[x, y] \ +""" + + assert upretty(F) == ucode_str + assert pretty(F) == ascii_str + + ucode_str = \ +"""\ +╱ ⎡ 2⎤╲\n\ +╲[x, y], ⎣1, x ⎦╱\ +""" + ascii_str = \ +"""\ + 2 \n\ +<[x, y], [1, x ]>\ +""" + + assert upretty(M) == ucode_str + assert pretty(M) == ascii_str + + I = R.ideal(x**2, y) + + ucode_str = \ +"""\ +╱ 2 ╲\n\ +╲x , y╱\ +""" + + ascii_str = \ +"""\ + 2 \n\ +\ +""" + + assert upretty(I) == ucode_str + assert pretty(I) == ascii_str + + Q = F / M + + ucode_str = \ +"""\ + 2 \n\ + ℚ[x, y] \n\ +─────────────────\n\ +╱ ⎡ 2⎤╲\n\ +╲[x, y], ⎣1, x ⎦╱\ +""" + + ascii_str = \ +"""\ + 2 \n\ + QQ[x, y] \n\ +-----------------\n\ + 2 \n\ +<[x, y], [1, x ]>\ +""" + + assert upretty(Q) == ucode_str + assert pretty(Q) == ascii_str + + ucode_str = \ +"""\ +╱⎡ 3⎤ ╲\n\ +│⎢ x ⎥ ╱ ⎡ 2⎤╲ ╱ ⎡ 2⎤╲│\n\ +│⎢1, ──⎥ + ╲[x, y], ⎣1, x ⎦╱, [2, y] + ╲[x, y], ⎣1, x ⎦╱│\n\ +╲⎣ 2 ⎦ ╱\ +""" + + ascii_str = \ +"""\ + 3 \n\ + x 2 2 \n\ +<[1, --] + <[x, y], [1, x ]>, [2, y] + <[x, y], [1, x ]>>\n\ + 2 \ +""" + + +def test_QuotientRing(): + R = QQ.old_poly_ring(x)/[x**2 + 1] + + ucode_str = \ +"""\ + ℚ[x] \n\ +────────\n\ +╱ 2 ╲\n\ +╲x + 1╱\ +""" + + ascii_str = \ +"""\ + QQ[x] \n\ +--------\n\ + 2 \n\ +\ +""" + + assert upretty(R) == ucode_str + assert pretty(R) == ascii_str + + ucode_str = \ +"""\ + ╱ 2 ╲\n\ +1 + ╲x + 1╱\ +""" + + ascii_str = \ +"""\ + 2 \n\ +1 + \ +""" + + assert upretty(R.one) == ucode_str + assert pretty(R.one) == ascii_str + + +def test_Homomorphism(): + from sympy.polys.agca import homomorphism + + R = QQ.old_poly_ring(x) + + expr = homomorphism(R.free_module(1), R.free_module(1), [0]) + + ucode_str = \ +"""\ + 1 1\n\ +[0] : ℚ[x] ──> ℚ[x] \ +""" + + ascii_str = \ +"""\ + 1 1\n\ +[0] : QQ[x] --> QQ[x] \ +""" + + assert upretty(expr) == ucode_str + assert pretty(expr) == ascii_str + + expr = homomorphism(R.free_module(2), R.free_module(2), [0, 0]) + + ucode_str = \ +"""\ +⎡0 0⎤ 2 2\n\ +⎢ ⎥ : ℚ[x] ──> ℚ[x] \n\ +⎣0 0⎦ \ +""" + + ascii_str = \ +"""\ +[0 0] 2 2\n\ +[ ] : QQ[x] --> QQ[x] \n\ +[0 0] \ +""" + + assert upretty(expr) == ucode_str + assert pretty(expr) == ascii_str + + expr = homomorphism(R.free_module(1), R.free_module(1) / [[x]], [0]) + + ucode_str = \ +"""\ + 1\n\ + 1 ℚ[x] \n\ +[0] : ℚ[x] ──> ─────\n\ + <[x]>\ +""" + + ascii_str = \ +"""\ + 1\n\ + 1 QQ[x] \n\ +[0] : QQ[x] --> ------\n\ + <[x]> \ +""" + + assert upretty(expr) == ucode_str + assert pretty(expr) == ascii_str + + +def test_Tr(): + A, B = symbols('A B', commutative=False) + t = Tr(A*B) + assert pretty(t) == r'Tr(A*B)' + assert upretty(t) == 'Tr(A⋅B)' + + +def test_pretty_Add(): + eq = Mul(-2, x - 2, evaluate=False) + 5 + assert pretty(eq) == '5 - 2*(x - 2)' + + +def test_issue_7179(): + assert upretty(Not(Equivalent(x, y))) == 'x ⇎ y' + assert upretty(Not(Implies(x, y))) == 'x ↛ y' + + +def test_issue_7180(): + assert upretty(Equivalent(x, y)) == 'x ⇔ y' + + +def test_pretty_Complement(): + assert pretty(S.Reals - S.Naturals) == '(-oo, oo) \\ Naturals' + assert upretty(S.Reals - S.Naturals) == 'ℝ \\ ℕ' + assert pretty(S.Reals - S.Naturals0) == '(-oo, oo) \\ Naturals0' + assert upretty(S.Reals - S.Naturals0) == 'ℝ \\ ℕ₀' + + +def test_pretty_SymmetricDifference(): + from sympy.sets.sets import SymmetricDifference + assert upretty(SymmetricDifference(Interval(2,3), Interval(3,5), \ + evaluate = False)) == '[2, 3] ∆ [3, 5]' + with raises(NotImplementedError): + pretty(SymmetricDifference(Interval(2,3), Interval(3,5), evaluate = False)) + + +def test_pretty_Contains(): + assert pretty(Contains(x, S.Integers)) == 'Contains(x, Integers)' + assert upretty(Contains(x, S.Integers)) == 'x ∈ ℤ' + + +def test_issue_8292(): + from sympy.core import sympify + e = sympify('((x+x**4)/(x-1))-(2*(x-1)**4/(x-1)**4)', evaluate=False) + ucode_str = \ +"""\ + 4 4 \n\ + 2⋅(x - 1) x + x\n\ +- ────────── + ──────\n\ + 4 x - 1 \n\ + (x - 1) \ +""" + ascii_str = \ +"""\ + 4 4 \n\ + 2*(x - 1) x + x\n\ +- ---------- + ------\n\ + 4 x - 1 \n\ + (x - 1) \ +""" + assert pretty(e) == ascii_str + assert upretty(e) == ucode_str + + +def test_issue_4335(): + y = Function('y') + expr = -y(x).diff(x) + ucode_str = \ +"""\ + d \n\ +-──(y(x))\n\ + dx \ +""" + ascii_str = \ +"""\ + d \n\ +- --(y(x))\n\ + dx \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_issue_8344(): + from sympy.core import sympify + e = sympify('2*x*y**2/1**2 + 1', evaluate=False) + ucode_str = \ +"""\ + 2 \n\ +2⋅x⋅y \n\ +────── + 1\n\ + 2 \n\ + 1 \ +""" + assert upretty(e) == ucode_str + + +def test_issue_6324(): + x = Pow(2, 3, evaluate=False) + y = Pow(10, -2, evaluate=False) + e = Mul(x, y, evaluate=False) + ucode_str = \ +"""\ + 3 \n\ +2 \n\ +───\n\ + 2\n\ +10 \ +""" + assert upretty(e) == ucode_str + + +def test_issue_7927(): + e = sin(x/2)**cos(x/2) + ucode_str = \ +"""\ + ⎛x⎞\n\ + cos⎜─⎟\n\ + ⎝2⎠\n\ +⎛ ⎛x⎞⎞ \n\ +⎜sin⎜─⎟⎟ \n\ +⎝ ⎝2⎠⎠ \ +""" + assert upretty(e) == ucode_str + e = sin(x)**(S(11)/13) + ucode_str = \ +"""\ + 11\n\ + ──\n\ + 13\n\ +(sin(x)) \ +""" + assert upretty(e) == ucode_str + + +def test_issue_6134(): + from sympy.abc import lamda, t + phi = Function('phi') + + e = lamda*x*Integral(phi(t)*pi*sin(pi*t), (t, 0, 1)) + lamda*x**2*Integral(phi(t)*2*pi*sin(2*pi*t), (t, 0, 1)) + ucode_str = \ +"""\ + 1 1 \n\ + 2 ⌠ ⌠ \n\ +λ⋅x ⋅⎮ 2⋅π⋅φ(t)⋅sin(2⋅π⋅t) dt + λ⋅x⋅⎮ π⋅φ(t)⋅sin(π⋅t) dt\n\ + ⌡ ⌡ \n\ + 0 0 \ +""" + assert upretty(e) == ucode_str + + +def test_issue_9877(): + ucode_str1 = '(2, 3) ∪ ([1, 2] \\ {x})' + a, b, c = Interval(2, 3, True, True), Interval(1, 2), FiniteSet(x) + assert upretty(Union(a, Complement(b, c))) == ucode_str1 + + ucode_str2 = '{x} ∩ {y} ∩ ({z} \\ [1, 2])' + d, e, f, g = FiniteSet(x), FiniteSet(y), FiniteSet(z), Interval(1, 2) + assert upretty(Intersection(d, e, Complement(f, g))) == ucode_str2 + + +def test_issue_13651(): + expr1 = c + Mul(-1, a + b, evaluate=False) + assert pretty(expr1) == 'c - (a + b)' + expr2 = c + Mul(-1, a - b + d, evaluate=False) + assert pretty(expr2) == 'c - (a - b + d)' + + +def test_pretty_primenu(): + from sympy.functions.combinatorial.numbers import primenu + + ascii_str1 = "nu(n)" + ucode_str1 = "ν(n)" + + n = symbols('n', integer=True) + assert pretty(primenu(n)) == ascii_str1 + assert upretty(primenu(n)) == ucode_str1 + + +def test_pretty_primeomega(): + from sympy.functions.combinatorial.numbers import primeomega + + ascii_str1 = "Omega(n)" + ucode_str1 = "Ω(n)" + + n = symbols('n', integer=True) + assert pretty(primeomega(n)) == ascii_str1 + assert upretty(primeomega(n)) == ucode_str1 + + +def test_pretty_Mod(): + from sympy.core import Mod + + ascii_str1 = "x mod 7" + ucode_str1 = "x mod 7" + + ascii_str2 = "(x + 1) mod 7" + ucode_str2 = "(x + 1) mod 7" + + ascii_str3 = "2*x mod 7" + ucode_str3 = "2⋅x mod 7" + + ascii_str4 = "(x mod 7) + 1" + ucode_str4 = "(x mod 7) + 1" + + ascii_str5 = "2*(x mod 7)" + ucode_str5 = "2⋅(x mod 7)" + + x = symbols('x', integer=True) + assert pretty(Mod(x, 7)) == ascii_str1 + assert upretty(Mod(x, 7)) == ucode_str1 + assert pretty(Mod(x + 1, 7)) == ascii_str2 + assert upretty(Mod(x + 1, 7)) == ucode_str2 + assert pretty(Mod(2 * x, 7)) == ascii_str3 + assert upretty(Mod(2 * x, 7)) == ucode_str3 + assert pretty(Mod(x, 7) + 1) == ascii_str4 + assert upretty(Mod(x, 7) + 1) == ucode_str4 + assert pretty(2 * Mod(x, 7)) == ascii_str5 + assert upretty(2 * Mod(x, 7)) == ucode_str5 + + +def test_issue_11801(): + assert pretty(Symbol("")) == "" + assert upretty(Symbol("")) == "" + + +def test_pretty_UnevaluatedExpr(): + x = symbols('x') + he = UnevaluatedExpr(1/x) + + ucode_str = \ +"""\ +1\n\ +─\n\ +x\ +""" + + assert upretty(he) == ucode_str + + ucode_str = \ +"""\ + 2\n\ +⎛1⎞ \n\ +⎜─⎟ \n\ +⎝x⎠ \ +""" + + assert upretty(he**2) == ucode_str + + ucode_str = \ +"""\ + 1\n\ +1 + ─\n\ + x\ +""" + + assert upretty(he + 1) == ucode_str + + ucode_str = \ +('''\ + 1\n\ +x⋅─\n\ + x\ +''') + assert upretty(x*he) == ucode_str + + +def test_issue_10472(): + M = (Matrix([[0, 0], [0, 0]]), Matrix([0, 0])) + + ucode_str = \ +"""\ +⎛⎡0 0⎤ ⎡0⎤⎞ +⎜⎢ ⎥, ⎢ ⎥⎟ +⎝⎣0 0⎦ ⎣0⎦⎠\ +""" + assert upretty(M) == ucode_str + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + ascii_str1 = "A_00" + ucode_str1 = "A₀₀" + assert pretty(A[0, 0]) == ascii_str1 + assert upretty(A[0, 0]) == ucode_str1 + + ascii_str1 = "3*A_00" + ucode_str1 = "3⋅A₀₀" + assert pretty(3*A[0, 0]) == ascii_str1 + assert upretty(3*A[0, 0]) == ucode_str1 + + ascii_str1 = "(-B + A)[0, 0]" + ucode_str1 = "(-B + A)[0, 0]" + F = C[0, 0].subs(C, A - B) + assert pretty(F) == ascii_str1 + assert upretty(F) == ucode_str1 + + +def test_issue_12675(): + x, y, t, j = symbols('x y t j') + e = CoordSys3D('e') + + ucode_str = \ +"""\ +⎛ t⎞ \n\ +⎜⎛x⎞ ⎟ j_e\n\ +⎜⎜─⎟ ⎟ \n\ +⎝⎝y⎠ ⎠ \ +""" + assert upretty((x/y)**t*e.j) == ucode_str + ucode_str = \ +"""\ +⎛1⎞ \n\ +⎜─⎟ j_e\n\ +⎝y⎠ \ +""" + assert upretty((1/y)*e.j) == ucode_str + + +def test_MatrixSymbol_printing(): + # test cases for issue #14237 + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + C = MatrixSymbol("C", 3, 3) + assert pretty(-A*B*C) == "-A*B*C" + assert pretty(A - B) == "-B + A" + assert pretty(A*B*C - A*B - B*C) == "-A*B -B*C + A*B*C" + + # issue #14814 + x = MatrixSymbol('x', n, n) + y = MatrixSymbol('y*', n, n) + assert pretty(x + y) == "x + y*" + ascii_str = \ +"""\ + 2 \n\ +-2*y* -a*x\ +""" + assert pretty(-a*x + -2*y*y) == ascii_str + + +def test_degree_printing(): + expr1 = 90*degree + assert pretty(expr1) == '90°' + expr2 = x*degree + assert pretty(expr2) == 'x°' + expr3 = cos(x*degree + 90*degree) + assert pretty(expr3) == 'cos(x° + 90°)' + + +def test_vector_expr_pretty_printing(): + A = CoordSys3D('A') + + assert upretty(Cross(A.i, A.x*A.i+3*A.y*A.j)) == "(i_A)×((x_A) i_A + (3⋅y_A) j_A)" + assert upretty(x*Cross(A.i, A.j)) == 'x⋅(i_A)×(j_A)' + + assert upretty(Curl(A.x*A.i + 3*A.y*A.j)) == "∇×((x_A) i_A + (3⋅y_A) j_A)" + + assert upretty(Divergence(A.x*A.i + 3*A.y*A.j)) == "∇⋅((x_A) i_A + (3⋅y_A) j_A)" + + assert upretty(Dot(A.i, A.x*A.i+3*A.y*A.j)) == "(i_A)⋅((x_A) i_A + (3⋅y_A) j_A)" + + assert upretty(Gradient(A.x+3*A.y)) == "∇(x_A + 3⋅y_A)" + assert upretty(Laplacian(A.x+3*A.y)) == "∆(x_A + 3⋅y_A)" + # TODO: add support for ASCII pretty. + + +def test_pretty_print_tensor_expr(): + L = TensorIndexType("L") + i, j, k = tensor_indices("i j k", L) + i0 = tensor_indices("i_0", L) + A, B, C, D = tensor_heads("A B C D", [L]) + H = TensorHead("H", [L, L]) + + expr = -i + ascii_str = \ +"""\ +-i\ +""" + ucode_str = \ +"""\ +-i\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(i) + ascii_str = \ +"""\ + i\n\ +A \n\ + \ +""" + ucode_str = \ +"""\ + i\n\ +A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(i0) + ascii_str = \ +"""\ + i_0\n\ +A \n\ + \ +""" + ucode_str = \ +"""\ + i₀\n\ +A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(-i) + ascii_str = \ +"""\ + \n\ +A \n\ + i\ +""" + ucode_str = \ +"""\ + \n\ +A \n\ + i\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = -3*A(-i) + ascii_str = \ +"""\ + \n\ +-3*A \n\ + i\ +""" + ucode_str = \ +"""\ + \n\ +-3⋅A \n\ + i\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = H(i, -j) + ascii_str = \ +"""\ + i \n\ +H \n\ + j\ +""" + ucode_str = \ +"""\ + i \n\ +H \n\ + j\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = H(i, -i) + ascii_str = \ +"""\ + L_0 \n\ +H \n\ + L_0\ +""" + ucode_str = \ +"""\ + L₀ \n\ +H \n\ + L₀\ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = H(i, -j)*A(j)*B(k) + ascii_str = \ +"""\ + i L_0 k\n\ +H *A *B \n\ + L_0 \ +""" + ucode_str = \ +"""\ + i L₀ k\n\ +H ⋅A ⋅B \n\ + L₀ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (1+x)*A(i) + ascii_str = \ +"""\ + i\n\ +(x + 1)*A \n\ + \ +""" + ucode_str = \ +"""\ + i\n\ +(x + 1)⋅A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(i) + 3*B(i) + ascii_str = \ +"""\ + i i\n\ +3*B + A \n\ + \ +""" + ucode_str = \ +"""\ + i i\n\ +3⋅B + A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_pretty_print_tensor_partial_deriv(): + from sympy.tensor.toperators import PartialDerivative + + L = TensorIndexType("L") + i, j, k = tensor_indices("i j k", L) + + A, B, C, D = tensor_heads("A B C D", [L]) + + H = TensorHead("H", [L, L]) + + expr = PartialDerivative(A(i), A(j)) + ascii_str = \ +"""\ + d / i\\\n\ +---|A |\n\ + j\\ /\n\ +dA \n\ + \ +""" + ucode_str = \ +"""\ + ∂ ⎛ i⎞\n\ +───⎜A ⎟\n\ + j⎝ ⎠\n\ +∂A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(i)*PartialDerivative(H(k, -i), A(j)) + ascii_str = \ +"""\ + L_0 d / k \\\n\ +A *---|H |\n\ + j\\ L_0/\n\ + dA \n\ + \ +""" + ucode_str = \ +"""\ + L₀ ∂ ⎛ k ⎞\n\ +A ⋅───⎜H ⎟\n\ + j⎝ L₀⎠\n\ + ∂A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = A(i)*PartialDerivative(B(k)*C(-i) + 3*H(k, -i), A(j)) + ascii_str = \ +"""\ + L_0 d / k k \\\n\ +A *---|3*H + B *C |\n\ + j\\ L_0 L_0/\n\ + dA \n\ + \ +""" + ucode_str = \ +"""\ + L₀ ∂ ⎛ k k ⎞\n\ +A ⋅───⎜3⋅H + B ⋅C ⎟\n\ + j⎝ L₀ L₀⎠\n\ + ∂A \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (A(i) + B(i))*PartialDerivative(C(j), D(j)) + ascii_str = \ +"""\ +/ i i\\ d / L_0\\\n\ +|A + B |*-----|C |\n\ +\\ / L_0\\ /\n\ + dD \n\ + \ +""" + ucode_str = \ +"""\ +⎛ i i⎞ ∂ ⎛ L₀⎞\n\ +⎜A + B ⎟⋅────⎜C ⎟\n\ +⎝ ⎠ L₀⎝ ⎠\n\ + ∂D \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = (A(i) + B(i))*PartialDerivative(C(-i), D(j)) + ascii_str = \ +"""\ +/ L_0 L_0\\ d / \\\n\ +|A + B |*---|C |\n\ +\\ / j\\ L_0/\n\ + dD \n\ + \ +""" + ucode_str = \ +"""\ +⎛ L₀ L₀⎞ ∂ ⎛ ⎞\n\ +⎜A + B ⎟⋅───⎜C ⎟\n\ +⎝ ⎠ j⎝ L₀⎠\n\ + ∂D \n\ + \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = PartialDerivative(B(-i) + A(-i), A(-j), A(-n)) + ucode_str = """\ + 2 \n\ + ∂ ⎛ ⎞\n\ +───────⎜A + B ⎟\n\ + ⎝ i i⎠\n\ +∂A ∂A \n\ + n j \ +""" + assert upretty(expr) == ucode_str + + expr = PartialDerivative(3*A(-i), A(-j), A(-n)) + ucode_str = """\ + 2 \n\ + ∂ ⎛ ⎞\n\ +───────⎜3⋅A ⎟\n\ + ⎝ i⎠\n\ +∂A ∂A \n\ + n j \ +""" + assert upretty(expr) == ucode_str + + expr = TensorElement(H(i, j), {i:1}) + ascii_str = \ +"""\ + i=1,j\n\ +H \n\ + \ +""" + ucode_str = ascii_str + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = TensorElement(H(i, j), {i: 1, j: 1}) + ascii_str = \ +"""\ + i=1,j=1\n\ +H \n\ + \ +""" + ucode_str = ascii_str + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = TensorElement(H(i, j), {j: 1}) + ascii_str = \ +"""\ + i,j=1\n\ +H \n\ + \ +""" + ucode_str = ascii_str + + expr = TensorElement(H(-i, j), {-i: 1}) + ascii_str = \ +"""\ + j\n\ +H \n\ + i=1 \ +""" + ucode_str = ascii_str + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_issue_15560(): + a = MatrixSymbol('a', 1, 1) + e = pretty(a*(KroneckerProduct(a, a))) + result = 'a*(a x a)' + assert e == result + + +def test_print_polylog(): + # Part of issue 6013 + uresult = 'Li₂(3)' + aresult = 'polylog(2, 3)' + assert pretty(polylog(2, 3)) == aresult + assert upretty(polylog(2, 3)) == uresult + + +# Issue #25312 +def test_print_expint_polylog_symbolic_order(): + s, z = symbols("s, z") + uresult = 'Liₛ(z)' + aresult = 'polylog(s, z)' + assert pretty(polylog(s, z)) == aresult + assert upretty(polylog(s, z)) == uresult + # TODO: TBD polylog(s - 1, z) + uresult = 'Eₛ(z)' + aresult = 'expint(s, z)' + assert pretty(expint(s, z)) == aresult + assert upretty(expint(s, z)) == uresult + + + +def test_print_polylog_long_order_issue_25309(): + s, z = symbols("s, z") + ucode_str = \ +"""\ + ⎛ 2 ⎞\n\ +polylog⎝s , z⎠\ +""" + assert upretty(polylog(s**2, z)) == ucode_str + + +def test_print_lerchphi(): + # Part of issue 6013 + a = Symbol('a') + pretty(lerchphi(a, 1, 2)) + uresult = 'Φ(a, 1, 2)' + aresult = 'lerchphi(a, 1, 2)' + assert pretty(lerchphi(a, 1, 2)) == aresult + assert upretty(lerchphi(a, 1, 2)) == uresult + + +def test_issue_15583(): + + N = mechanics.ReferenceFrame('N') + result = '(n_x, n_y, n_z)' + e = pretty((N.x, N.y, N.z)) + assert e == result + + +def test_matrixSymbolBold(): + # Issue 15871 + def boldpretty(expr): + return xpretty(expr, use_unicode=True, wrap_line=False, mat_symbol_style="bold") + + from sympy.matrices.expressions.trace import trace + A = MatrixSymbol("A", 2, 2) + assert boldpretty(trace(A)) == 'tr(𝐀)' + + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + C = MatrixSymbol("C", 3, 3) + + assert boldpretty(-A) == '-𝐀' + assert boldpretty(A - A*B - B) == '-𝐁 -𝐀⋅𝐁 + 𝐀' + assert boldpretty(-A*B - A*B*C - B) == '-𝐁 -𝐀⋅𝐁 -𝐀⋅𝐁⋅𝐂' + + A = MatrixSymbol("Addot", 3, 3) + assert boldpretty(A) == '𝐀̈' + omega = MatrixSymbol("omega", 3, 3) + assert boldpretty(omega) == 'ω' + omega = MatrixSymbol("omeganorm", 3, 3) + assert boldpretty(omega) == '‖ω‖' + + a = Symbol('alpha') + b = Symbol('b') + c = MatrixSymbol("c", 3, 1) + d = MatrixSymbol("d", 3, 1) + + assert boldpretty(a*B*c+b*d) == 'b⋅𝐝 + α⋅𝐁⋅𝐜' + + d = MatrixSymbol("delta", 3, 1) + B = MatrixSymbol("Beta", 3, 3) + + assert boldpretty(a*B*c+b*d) == 'b⋅δ + α⋅Β⋅𝐜' + + A = MatrixSymbol("A_2", 3, 3) + assert boldpretty(A) == '𝐀₂' + + +def test_center_accent(): + assert center_accent('a', '\N{COMBINING TILDE}') == 'ã' + assert center_accent('aa', '\N{COMBINING TILDE}') == 'aã' + assert center_accent('aaa', '\N{COMBINING TILDE}') == 'aãa' + assert center_accent('aaaa', '\N{COMBINING TILDE}') == 'aaãa' + assert center_accent('aaaaa', '\N{COMBINING TILDE}') == 'aaãaa' + assert center_accent('abcdefg', '\N{COMBINING FOUR DOTS ABOVE}') == 'abcd⃜efg' + + +def test_imaginary_unit(): + from sympy.printing.pretty import pretty # b/c it was redefined above + assert pretty(1 + I, use_unicode=False) == '1 + I' + assert pretty(1 + I, use_unicode=True) == '1 + ⅈ' + assert pretty(1 + I, use_unicode=False, imaginary_unit='j') == '1 + I' + assert pretty(1 + I, use_unicode=True, imaginary_unit='j') == '1 + ⅉ' + + raises(TypeError, lambda: pretty(I, imaginary_unit=I)) + raises(ValueError, lambda: pretty(I, imaginary_unit="kkk")) + + +def test_str_special_matrices(): + from sympy.matrices import Identity, ZeroMatrix, OneMatrix + assert pretty(Identity(4)) == 'I' + assert upretty(Identity(4)) == '𝕀' + assert pretty(ZeroMatrix(2, 2)) == '0' + assert upretty(ZeroMatrix(2, 2)) == '𝟘' + assert pretty(OneMatrix(2, 2)) == '1' + assert upretty(OneMatrix(2, 2)) == '𝟙' + + +def test_pretty_misc_functions(): + assert pretty(LambertW(x)) == 'W(x)' + assert upretty(LambertW(x)) == 'W(x)' + assert pretty(LambertW(x, y)) == 'W(x, y)' + assert upretty(LambertW(x, y)) == 'W(x, y)' + assert pretty(airyai(x)) == 'Ai(x)' + assert upretty(airyai(x)) == 'Ai(x)' + assert pretty(airybi(x)) == 'Bi(x)' + assert upretty(airybi(x)) == 'Bi(x)' + assert pretty(airyaiprime(x)) == "Ai'(x)" + assert upretty(airyaiprime(x)) == "Ai'(x)" + assert pretty(airybiprime(x)) == "Bi'(x)" + assert upretty(airybiprime(x)) == "Bi'(x)" + assert pretty(fresnelc(x)) == 'C(x)' + assert upretty(fresnelc(x)) == 'C(x)' + assert pretty(fresnels(x)) == 'S(x)' + assert upretty(fresnels(x)) == 'S(x)' + assert pretty(Heaviside(x)) == 'Heaviside(x)' + assert upretty(Heaviside(x)) == 'θ(x)' + assert pretty(Heaviside(x, y)) == 'Heaviside(x, y)' + assert upretty(Heaviside(x, y)) == 'θ(x, y)' + assert pretty(dirichlet_eta(x)) == 'dirichlet_eta(x)' + assert upretty(dirichlet_eta(x)) == 'η(x)' + + +def test_hadamard_power(): + m, n, p = symbols('m, n, p', integer=True) + A = MatrixSymbol('A', m, n) + B = MatrixSymbol('B', m, n) + + # Testing printer: + expr = hadamard_power(A, n) + ascii_str = \ +"""\ + .n\n\ +A \ +""" + ucode_str = \ +"""\ + ∘n\n\ +A \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hadamard_power(A, 1+n) + ascii_str = \ +"""\ + .(n + 1)\n\ +A \ +""" + ucode_str = \ +"""\ + ∘(n + 1)\n\ +A \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + expr = hadamard_power(A*B.T, 1+n) + ascii_str = \ +"""\ + .(n + 1)\n\ +/ T\\ \n\ +\\A*B / \ +""" + ucode_str = \ +"""\ + ∘(n + 1)\n\ +⎛ T⎞ \n\ +⎝A⋅B ⎠ \ +""" + assert pretty(expr) == ascii_str + assert upretty(expr) == ucode_str + + +def test_issue_17258(): + n = Symbol('n', integer=True) + assert pretty(Sum(n, (n, -oo, 1))) == \ + ' 1 \n'\ + ' __ \n'\ + ' \\ ` \n'\ + ' ) n\n'\ + ' /_, \n'\ + 'n = -oo ' + + assert upretty(Sum(n, (n, -oo, 1))) == \ +"""\ + 1 \n\ + ___ \n\ + ╲ \n\ + ╲ \n\ + ╱ n\n\ + ╱ \n\ + ‾‾‾ \n\ +n = -∞ \ +""" + + +def test_is_combining(): + line = "v̇_m" + assert [is_combining(sym) for sym in line] == \ + [False, True, False, False] + + +def test_issue_17616(): + assert pretty(pi**(1/exp(1))) == \ + ' / -1\\\n'\ + ' \\e /\n'\ + 'pi ' + + assert upretty(pi**(1/exp(1))) == \ + ' ⎛ -1⎞\n'\ + ' ⎝ℯ ⎠\n'\ + 'π ' + + assert pretty(pi**(1/pi)) == \ + ' 1 \n'\ + ' --\n'\ + ' pi\n'\ + 'pi ' + + assert upretty(pi**(1/pi)) == \ + ' 1\n'\ + ' ─\n'\ + ' π\n'\ + 'π ' + + assert pretty(pi**(1/EulerGamma)) == \ + ' 1 \n'\ + ' ----------\n'\ + ' EulerGamma\n'\ + 'pi ' + + assert upretty(pi**(1/EulerGamma)) == \ + ' 1\n'\ + ' ─\n'\ + ' γ\n'\ + 'π ' + + z = Symbol("x_17") + assert upretty(7**(1/z)) == \ + 'x₁₇___\n'\ + ' ╲╱ 7 ' + + assert pretty(7**(1/z)) == \ + 'x_17___\n'\ + ' \\/ 7 ' + + +def test_issue_17857(): + assert pretty(Range(-oo, oo)) == '{..., -1, 0, 1, ...}' + assert pretty(Range(oo, -oo, -1)) == '{..., 1, 0, -1, ...}' + + +def test_issue_18272(): + x = Symbol('x') + n = Symbol('n') + + assert upretty(ConditionSet(x, Eq(-x + exp(x), 0), S.Complexes)) == \ + '⎧ │ ⎛ x ⎞⎫\n'\ + '⎨x │ x ∊ ℂ ∧ ⎝-x + ℯ = 0⎠⎬\n'\ + '⎩ │ ⎭' + assert upretty(ConditionSet(x, Contains(n/2, Interval(0, oo)), FiniteSet(-n/2, n/2))) == \ + '⎧ │ ⎧-n n⎫ ⎛n ⎞⎫\n'\ + '⎨x │ x ∊ ⎨───, ─⎬ ∧ ⎜─ ∈ [0, ∞)⎟⎬\n'\ + '⎩ │ ⎩ 2 2⎭ ⎝2 ⎠⎭' + assert upretty(ConditionSet(x, Eq(Piecewise((1, x >= 3), (x/2 - 1/2, x >= 2), (1/2, x >= 1), + (x/2, True)) - 1/2, 0), Interval(0, 3))) == \ + '⎧ │ ⎛⎛⎧ 1 for x ≥ 3⎞ ⎞⎫\n'\ + '⎪ │ ⎜⎜⎪ ⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪x ⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪─ - 0.5 for x ≥ 2⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪2 ⎟ ⎟⎪\n'\ + '⎨x │ x ∊ [0, 3] ∧ ⎜⎜⎨ ⎟ - 0.5 = 0⎟⎬\n'\ + '⎪ │ ⎜⎜⎪ 0.5 for x ≥ 1⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪ ⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪ x ⎟ ⎟⎪\n'\ + '⎪ │ ⎜⎜⎪ ─ otherwise⎟ ⎟⎪\n'\ + '⎩ │ ⎝⎝⎩ 2 ⎠ ⎠⎭' + + +def test_Str(): + from sympy.core.symbol import Str + assert pretty(Str('x')) == 'x' + + +def test_symbolic_probability(): + mu = symbols("mu") + sigma = symbols("sigma", positive=True) + X = Normal("X", mu, sigma) + assert pretty(Expectation(X)) == r'E[X]' + assert pretty(Variance(X)) == r'Var(X)' + assert pretty(Probability(X > 0)) == r'P(X > 0)' + Y = Normal("Y", mu, sigma) + assert pretty(Covariance(X, Y)) == 'Cov(X, Y)' + + +def test_issue_21758(): + from sympy.functions.elementary.piecewise import piecewise_fold + from sympy.series.fourier import FourierSeries + x = Symbol('x') + k, n = symbols('k n') + fo = FourierSeries(x, (x, -pi, pi), (0, SeqFormula(0, (k, 1, oo)), SeqFormula( + Piecewise((-2*pi*cos(n*pi)/n + 2*sin(n*pi)/n**2, (n > -oo) & (n < oo) & Ne(n, 0)), + (0, True))*sin(n*x)/pi, (n, 1, oo)))) + assert upretty(piecewise_fold(fo)) == \ + '⎧ 2⋅sin(3⋅x) \n'\ + '⎪2⋅sin(x) - sin(2⋅x) + ────────── + … for n > -∞ ∧ n < ∞ ∧ n ≠ 0\n'\ + '⎨ 3 \n'\ + '⎪ \n'\ + '⎩ 0 otherwise ' + assert pretty(FourierSeries(x, (x, -pi, pi), (0, SeqFormula(0, (k, 1, oo)), + SeqFormula(0, (n, 1, oo))))) == '0' + + +def test_diffgeom(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField + x,y = symbols('x y', real=True) + m = Manifold('M', 2) + assert pretty(m) == 'M' + p = Patch('P', m) + assert pretty(p) == "P" + rect = CoordSystem('rect', p, [x, y]) + assert pretty(rect) == "rect" + b = BaseScalarField(rect, 0) + assert pretty(b) == "x" + + +def test_deprecated_prettyForm(): + with warns_deprecated_sympy(): + from sympy.printing.pretty.pretty_symbology import xstr + assert xstr(1) == '1' + + with warns_deprecated_sympy(): + from sympy.printing.pretty.stringpict import prettyForm + p = prettyForm('s', unicode='s') + + with warns_deprecated_sympy(): + assert p.unicode == p.s == 's' + + +def test_center(): + assert center('1', 2) == '1 ' + assert center('1', 3) == ' 1 ' + assert center('1', 3, '-') == '-1-' + assert center('1', 5, '-') == '--1--' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/preview.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/preview.py new file mode 100644 index 0000000000000000000000000000000000000000..b04a344b5b4acc086eb84ff068bc1c6a8b55d811 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/preview.py @@ -0,0 +1,390 @@ +import os +from os.path import join +import shutil +import tempfile +from pathlib import Path + +try: + from subprocess import STDOUT, CalledProcessError, check_output +except ImportError: + pass + +from sympy.utilities.decorator import doctest_depends_on +from sympy.utilities.misc import debug +from .latex import latex + +__doctest_requires__ = {('preview',): ['pyglet']} + + +def _check_output_no_window(*args, **kwargs): + # Avoid showing a cmd.exe window when running this + # on Windows + if os.name == 'nt': + creation_flag = 0x08000000 # CREATE_NO_WINDOW + else: + creation_flag = 0 # Default value + return check_output(*args, creationflags=creation_flag, **kwargs) + + +def system_default_viewer(fname, fmt): + """ Open fname with the default system viewer. + + In practice, it is impossible for python to know when the system viewer is + done. For this reason, we ensure the passed file will not be deleted under + it, and this function does not attempt to block. + """ + # copy to a new temporary file that will not be deleted + with tempfile.NamedTemporaryFile(prefix='sympy-preview-', + suffix=os.path.splitext(fname)[1], + delete=False) as temp_f: + with open(fname, 'rb') as f: + shutil.copyfileobj(f, temp_f) + + import platform + if platform.system() == 'Darwin': + import subprocess + subprocess.call(('open', temp_f.name)) + elif platform.system() == 'Windows': + os.startfile(temp_f.name) + else: + import subprocess + subprocess.call(('xdg-open', temp_f.name)) + + +def pyglet_viewer(fname, fmt): + try: + from pyglet import window, image, gl + from pyglet.window import key + from pyglet.image.codecs import ImageDecodeException + except ImportError: + raise ImportError("pyglet is required for preview.\n visit https://pyglet.org/") + + try: + img = image.load(fname) + except ImageDecodeException: + raise ValueError("pyglet preview does not work for '{}' files.".format(fmt)) + + offset = 25 + + config = gl.Config(double_buffer=False) + win = window.Window( + width=img.width + 2*offset, + height=img.height + 2*offset, + caption="SymPy", + resizable=False, + config=config + ) + + win.set_vsync(False) + + try: + def on_close(): + win.has_exit = True + + win.on_close = on_close + + def on_key_press(symbol, modifiers): + if symbol in [key.Q, key.ESCAPE]: + on_close() + + win.on_key_press = on_key_press + + def on_expose(): + gl.glClearColor(1.0, 1.0, 1.0, 1.0) + gl.glClear(gl.GL_COLOR_BUFFER_BIT) + + img.blit( + (win.width - img.width) / 2, + (win.height - img.height) / 2 + ) + + win.on_expose = on_expose + + while not win.has_exit: + win.dispatch_events() + win.flip() + except KeyboardInterrupt: + pass + + win.close() + + +def _get_latex_main(expr, *, preamble=None, packages=(), extra_preamble=None, + euler=True, fontsize=None, **latex_settings): + """ + Generate string of a LaTeX document rendering ``expr``. + """ + if preamble is None: + actual_packages = packages + ("amsmath", "amsfonts") + if euler: + actual_packages += ("euler",) + package_includes = "\n" + "\n".join(["\\usepackage{%s}" % p + for p in actual_packages]) + if extra_preamble: + package_includes += extra_preamble + + if not fontsize: + fontsize = "12pt" + elif isinstance(fontsize, int): + fontsize = "{}pt".format(fontsize) + preamble = r"""\documentclass[varwidth,%s]{standalone} +%s + +\begin{document} +""" % (fontsize, package_includes) + else: + if packages or extra_preamble: + raise ValueError("The \"packages\" or \"extra_preamble\" keywords" + "must not be set if a " + "custom LaTeX preamble was specified") + + if isinstance(expr, str): + latex_string = expr + else: + latex_string = ('$\\displaystyle ' + + latex(expr, mode='plain', **latex_settings) + + '$') + + return preamble + '\n' + latex_string + '\n\n' + r"\end{document}" + + +@doctest_depends_on(exe=('latex', 'dvipng'), modules=('pyglet',), + disable_viewers=('evince', 'gimp', 'superior-dvi-viewer')) +def preview(expr, output='png', viewer=None, euler=True, packages=(), + filename=None, outputbuffer=None, preamble=None, dvioptions=None, + outputTexFile=None, extra_preamble=None, fontsize=None, + **latex_settings): + r""" + View expression or LaTeX markup in PNG, DVI, PostScript or PDF form. + + If the expr argument is an expression, it will be exported to LaTeX and + then compiled using the available TeX distribution. The first argument, + 'expr', may also be a LaTeX string. The function will then run the + appropriate viewer for the given output format or use the user defined + one. By default png output is generated. + + By default pretty Euler fonts are used for typesetting (they were used to + typeset the well known "Concrete Mathematics" book). For that to work, you + need the 'eulervm.sty' LaTeX style (in Debian/Ubuntu, install the + texlive-fonts-extra package). If you prefer default AMS fonts or your + system lacks 'eulervm' LaTeX package then unset the 'euler' keyword + argument. + + To use viewer auto-detection, lets say for 'png' output, issue + + >>> from sympy import symbols, preview, Symbol + >>> x, y = symbols("x,y") + + >>> preview(x + y, output='png') + + This will choose 'pyglet' by default. To select a different one, do + + >>> preview(x + y, output='png', viewer='gimp') + + The 'png' format is considered special. For all other formats the rules + are slightly different. As an example we will take 'dvi' output format. If + you would run + + >>> preview(x + y, output='dvi') + + then 'view' will look for available 'dvi' viewers on your system + (predefined in the function, so it will try evince, first, then kdvi and + xdvi). If nothing is found, it will fall back to using a system file + association (via ``open`` and ``xdg-open``). To always use your system file + association without searching for the above readers, use + + >>> from sympy.printing.preview import system_default_viewer + >>> preview(x + y, output='dvi', viewer=system_default_viewer) + + If this still does not find the viewer you want, it can be set explicitly. + + >>> preview(x + y, output='dvi', viewer='superior-dvi-viewer') + + This will skip auto-detection and will run user specified + 'superior-dvi-viewer'. If ``view`` fails to find it on your system it will + gracefully raise an exception. + + You may also enter ``'file'`` for the viewer argument. Doing so will cause + this function to return a file object in read-only mode, if ``filename`` + is unset. However, if it was set, then 'preview' writes the generated + file to this filename instead. + + There is also support for writing to a ``io.BytesIO`` like object, which + needs to be passed to the ``outputbuffer`` argument. + + >>> from io import BytesIO + >>> obj = BytesIO() + >>> preview(x + y, output='png', viewer='BytesIO', + ... outputbuffer=obj) + + The LaTeX preamble can be customized by setting the 'preamble' keyword + argument. This can be used, e.g., to set a different font size, use a + custom documentclass or import certain set of LaTeX packages. + + >>> preamble = "\\documentclass[10pt]{article}\n" \ + ... "\\usepackage{amsmath,amsfonts}\\begin{document}" + >>> preview(x + y, output='png', preamble=preamble) + + It is also possible to use the standard preamble and provide additional + information to the preamble using the ``extra_preamble`` keyword argument. + + >>> from sympy import sin + >>> extra_preamble = "\\renewcommand{\\sin}{\\cos}" + >>> preview(sin(x), output='png', extra_preamble=extra_preamble) + + If the value of 'output' is different from 'dvi' then command line + options can be set ('dvioptions' argument) for the execution of the + 'dvi'+output conversion tool. These options have to be in the form of a + list of strings (see ``subprocess.Popen``). + + Additional keyword args will be passed to the :func:`~sympy.printing.latex.latex` call, + e.g., the ``symbol_names`` flag. + + >>> phidd = Symbol('phidd') + >>> preview(phidd, symbol_names={phidd: r'\ddot{\varphi}'}) + + For post-processing the generated TeX File can be written to a file by + passing the desired filename to the 'outputTexFile' keyword + argument. To write the TeX code to a file named + ``"sample.tex"`` and run the default png viewer to display the resulting + bitmap, do + + >>> preview(x + y, outputTexFile="sample.tex") + + + """ + # pyglet is the default for png + if viewer is None and output == "png": + try: + import pyglet # noqa: F401 + except ImportError: + pass + else: + viewer = pyglet_viewer + + # look up a known application + if viewer is None: + # sorted in order from most pretty to most ugly + # very discussable, but indeed 'gv' looks awful :) + candidates = { + "dvi": [ "evince", "okular", "kdvi", "xdvi" ], + "ps": [ "evince", "okular", "gsview", "gv" ], + "pdf": [ "evince", "okular", "kpdf", "acroread", "xpdf", "gv" ], + } + + for candidate in candidates.get(output, []): + path = shutil.which(candidate) + if path is not None: + viewer = path + break + + # otherwise, use the system default for file association + if viewer is None: + viewer = system_default_viewer + + if viewer == "file": + if filename is None: + raise ValueError("filename has to be specified if viewer=\"file\"") + elif viewer == "BytesIO": + if outputbuffer is None: + raise ValueError("outputbuffer has to be a BytesIO " + "compatible object if viewer=\"BytesIO\"") + elif not callable(viewer) and not shutil.which(viewer): + raise OSError("Unrecognized viewer: %s" % viewer) + + latex_main = _get_latex_main(expr, preamble=preamble, packages=packages, + euler=euler, extra_preamble=extra_preamble, + fontsize=fontsize, **latex_settings) + + debug("Latex code:") + debug(latex_main) + with tempfile.TemporaryDirectory() as workdir: + Path(join(workdir, 'texput.tex')).write_text(latex_main, encoding='utf-8') + + if outputTexFile is not None: + shutil.copyfile(join(workdir, 'texput.tex'), outputTexFile) + + if not shutil.which('latex'): + raise RuntimeError("latex program is not installed") + + try: + _check_output_no_window( + ['latex', '-halt-on-error', '-interaction=nonstopmode', + 'texput.tex'], + cwd=workdir, + stderr=STDOUT) + except CalledProcessError as e: + raise RuntimeError( + "'latex' exited abnormally with the following output:\n%s" % + e.output) + + src = "texput.%s" % (output) + + if output != "dvi": + # in order of preference + commandnames = { + "ps": ["dvips"], + "pdf": ["dvipdfmx", "dvipdfm", "dvipdf"], + "png": ["dvipng"], + "svg": ["dvisvgm"], + } + try: + cmd_variants = commandnames[output] + except KeyError: + raise ValueError("Invalid output format: %s" % output) from None + + # find an appropriate command + for cmd_variant in cmd_variants: + cmd_path = shutil.which(cmd_variant) + if cmd_path: + cmd = [cmd_path] + break + else: + if len(cmd_variants) > 1: + raise RuntimeError("None of %s are installed" % ", ".join(cmd_variants)) + else: + raise RuntimeError("%s is not installed" % cmd_variants[0]) + + defaultoptions = { + "dvipng": ["-T", "tight", "-z", "9", "--truecolor"], + "dvisvgm": ["--no-fonts"], + } + + commandend = { + "dvips": ["-o", src, "texput.dvi"], + "dvipdf": ["texput.dvi", src], + "dvipdfm": ["-o", src, "texput.dvi"], + "dvipdfmx": ["-o", src, "texput.dvi"], + "dvipng": ["-o", src, "texput.dvi"], + "dvisvgm": ["-o", src, "texput.dvi"], + } + + if dvioptions is not None: + cmd.extend(dvioptions) + else: + cmd.extend(defaultoptions.get(cmd_variant, [])) + cmd.extend(commandend[cmd_variant]) + + try: + _check_output_no_window(cmd, cwd=workdir, stderr=STDOUT) + except CalledProcessError as e: + raise RuntimeError( + "'%s' exited abnormally with the following output:\n%s" % + (' '.join(cmd), e.output)) + + + if viewer == "file": + shutil.move(join(workdir, src), filename) + elif viewer == "BytesIO": + s = Path(join(workdir, src)).read_bytes() + outputbuffer.write(s) + elif callable(viewer): + viewer(join(workdir, src), fmt=output) + else: + try: + _check_output_no_window( + [viewer, src], cwd=workdir, stderr=STDOUT) + except CalledProcessError as e: + raise RuntimeError( + "'%s %s' exited abnormally with the following output:\n%s" % + (viewer, src, e.output)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/printer.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/printer.py new file mode 100644 index 0000000000000000000000000000000000000000..0c0a6970920cf0928ad330ed9a3ea4291107a29d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/printer.py @@ -0,0 +1,432 @@ +"""Printing subsystem driver + +SymPy's printing system works the following way: Any expression can be +passed to a designated Printer who then is responsible to return an +adequate representation of that expression. + +**The basic concept is the following:** + +1. Let the object print itself if it knows how. +2. Take the best fitting method defined in the printer. +3. As fall-back use the emptyPrinter method for the printer. + +Which Method is Responsible for Printing? +^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ + +The whole printing process is started by calling ``.doprint(expr)`` on the printer +which you want to use. This method looks for an appropriate method which can +print the given expression in the given style that the printer defines. +While looking for the method, it follows these steps: + +1. **Let the object print itself if it knows how.** + + The printer looks for a specific method in every object. The name of that method + depends on the specific printer and is defined under ``Printer.printmethod``. + For example, StrPrinter calls ``_sympystr`` and LatexPrinter calls ``_latex``. + Look at the documentation of the printer that you want to use. + The name of the method is specified there. + + This was the original way of doing printing in sympy. Every class had + its own latex, mathml, str and repr methods, but it turned out that it + is hard to produce a high quality printer, if all the methods are spread + out that far. Therefore all printing code was combined into the different + printers, which works great for built-in SymPy objects, but not that + good for user defined classes where it is inconvenient to patch the + printers. + +2. **Take the best fitting method defined in the printer.** + + The printer loops through expr classes (class + its bases), and tries + to dispatch the work to ``_print_`` + + e.g., suppose we have the following class hierarchy:: + + Basic + | + Atom + | + Number + | + Rational + + then, for ``expr=Rational(...)``, the Printer will try + to call printer methods in the order as shown in the figure below:: + + p._print(expr) + | + |-- p._print_Rational(expr) + | + |-- p._print_Number(expr) + | + |-- p._print_Atom(expr) + | + `-- p._print_Basic(expr) + + if ``._print_Rational`` method exists in the printer, then it is called, + and the result is returned back. Otherwise, the printer tries to call + ``._print_Number`` and so on. + +3. **As a fall-back use the emptyPrinter method for the printer.** + + As fall-back ``self.emptyPrinter`` will be called with the expression. If + not defined in the Printer subclass this will be the same as ``str(expr)``. + +.. _printer_example: + +Example of Custom Printer +^^^^^^^^^^^^^^^^^^^^^^^^^ + +In the example below, we have a printer which prints the derivative of a function +in a shorter form. + +.. code-block:: python + + from sympy.core.symbol import Symbol + from sympy.printing.latex import LatexPrinter, print_latex + from sympy.core.function import UndefinedFunction, Function + + + class MyLatexPrinter(LatexPrinter): + \"\"\"Print derivative of a function of symbols in a shorter form. + \"\"\" + def _print_Derivative(self, expr): + function, *vars = expr.args + if not isinstance(type(function), UndefinedFunction) or \\ + not all(isinstance(i, Symbol) for i in vars): + return super()._print_Derivative(expr) + + # If you want the printer to work correctly for nested + # expressions then use self._print() instead of str() or latex(). + # See the example of nested modulo below in the custom printing + # method section. + return "{}_{{{}}}".format( + self._print(Symbol(function.func.__name__)), + ''.join(self._print(i) for i in vars)) + + + def print_my_latex(expr): + \"\"\" Most of the printers define their own wrappers for print(). + These wrappers usually take printer settings. Our printer does not have + any settings. + \"\"\" + print(MyLatexPrinter().doprint(expr)) + + + y = Symbol("y") + x = Symbol("x") + f = Function("f") + expr = f(x, y).diff(x, y) + + # Print the expression using the normal latex printer and our custom + # printer. + print_latex(expr) + print_my_latex(expr) + +The output of the code above is:: + + \\frac{\\partial^{2}}{\\partial x\\partial y} f{\\left(x,y \\right)} + f_{xy} + +.. _printer_method_example: + +Example of Custom Printing Method +^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ + +In the example below, the latex printing of the modulo operator is modified. +This is done by overriding the method ``_latex`` of ``Mod``. + +>>> from sympy import Symbol, Mod, Integer, print_latex + +>>> # Always use printer._print() +>>> class ModOp(Mod): +... def _latex(self, printer): +... a, b = [printer._print(i) for i in self.args] +... return r"\\operatorname{Mod}{\\left(%s, %s\\right)}" % (a, b) + +Comparing the output of our custom operator to the builtin one: + +>>> x = Symbol('x') +>>> m = Symbol('m') +>>> print_latex(Mod(x, m)) +x \\bmod m +>>> print_latex(ModOp(x, m)) +\\operatorname{Mod}{\\left(x, m\\right)} + +Common mistakes +~~~~~~~~~~~~~~~ +It's important to always use ``self._print(obj)`` to print subcomponents of +an expression when customizing a printer. Mistakes include: + +1. Using ``self.doprint(obj)`` instead: + + >>> # This example does not work properly, as only the outermost call may use + >>> # doprint. + >>> class ModOpModeWrong(Mod): + ... def _latex(self, printer): + ... a, b = [printer.doprint(i) for i in self.args] + ... return r"\\operatorname{Mod}{\\left(%s, %s\\right)}" % (a, b) + + This fails when the ``mode`` argument is passed to the printer: + + >>> print_latex(ModOp(x, m), mode='inline') # ok + $\\operatorname{Mod}{\\left(x, m\\right)}$ + >>> print_latex(ModOpModeWrong(x, m), mode='inline') # bad + $\\operatorname{Mod}{\\left($x$, $m$\\right)}$ + +2. Using ``str(obj)`` instead: + + >>> class ModOpNestedWrong(Mod): + ... def _latex(self, printer): + ... a, b = [str(i) for i in self.args] + ... return r"\\operatorname{Mod}{\\left(%s, %s\\right)}" % (a, b) + + This fails on nested objects: + + >>> # Nested modulo. + >>> print_latex(ModOp(ModOp(x, m), Integer(7))) # ok + \\operatorname{Mod}{\\left(\\operatorname{Mod}{\\left(x, m\\right)}, 7\\right)} + >>> print_latex(ModOpNestedWrong(ModOpNestedWrong(x, m), Integer(7))) # bad + \\operatorname{Mod}{\\left(ModOpNestedWrong(x, m), 7\\right)} + +3. Using ``LatexPrinter()._print(obj)`` instead. + + >>> from sympy.printing.latex import LatexPrinter + >>> class ModOpSettingsWrong(Mod): + ... def _latex(self, printer): + ... a, b = [LatexPrinter()._print(i) for i in self.args] + ... return r"\\operatorname{Mod}{\\left(%s, %s\\right)}" % (a, b) + + This causes all the settings to be discarded in the subobjects. As an + example, the ``full_prec`` setting which shows floats to full precision is + ignored: + + >>> from sympy import Float + >>> print_latex(ModOp(Float(1) * x, m), full_prec=True) # ok + \\operatorname{Mod}{\\left(1.00000000000000 x, m\\right)} + >>> print_latex(ModOpSettingsWrong(Float(1) * x, m), full_prec=True) # bad + \\operatorname{Mod}{\\left(1.0 x, m\\right)} + +""" + +from __future__ import annotations +import sys +from typing import Any, Type +import inspect +from contextlib import contextmanager +from functools import cmp_to_key, update_wrapper + +from sympy.core.add import Add +from sympy.core.basic import Basic + +from sympy.core.function import AppliedUndef, UndefinedFunction, Function + + + +@contextmanager +def printer_context(printer, **kwargs): + original = printer._context.copy() + try: + printer._context.update(kwargs) + yield + finally: + printer._context = original + + +class Printer: + """ Generic printer + + Its job is to provide infrastructure for implementing new printers easily. + + If you want to define your custom Printer or your custom printing method + for your custom class then see the example above: printer_example_ . + """ + + _global_settings: dict[str, Any] = {} + + _default_settings: dict[str, Any] = {} + + # must be initialized to pass tests and cannot be set to '| None' to pass mypy + printmethod = None # type: str + + @classmethod + def _get_initial_settings(cls): + settings = cls._default_settings.copy() + for key, val in cls._global_settings.items(): + if key in cls._default_settings: + settings[key] = val + return settings + + def __init__(self, settings=None): + self._str = str + + self._settings = self._get_initial_settings() + self._context = {} # mutable during printing + + if settings is not None: + self._settings.update(settings) + + if len(self._settings) > len(self._default_settings): + for key in self._settings: + if key not in self._default_settings: + raise TypeError("Unknown setting '%s'." % key) + + # _print_level is the number of times self._print() was recursively + # called. See StrPrinter._print_Float() for an example of usage + self._print_level = 0 + + @classmethod + def set_global_settings(cls, **settings): + """Set system-wide printing settings. """ + for key, val in settings.items(): + if val is not None: + cls._global_settings[key] = val + + @property + def order(self): + if 'order' in self._settings: + return self._settings['order'] + else: + raise AttributeError("No order defined.") + + def doprint(self, expr): + """Returns printer's representation for expr (as a string)""" + return self._str(self._print(expr)) + + def _print(self, expr, **kwargs) -> str: + """Internal dispatcher + + Tries the following concepts to print an expression: + 1. Let the object print itself if it knows how. + 2. Take the best fitting method defined in the printer. + 3. As fall-back use the emptyPrinter method for the printer. + """ + self._print_level += 1 + try: + # If the printer defines a name for a printing method + # (Printer.printmethod) and the object knows for itself how it + # should be printed, use that method. + if self.printmethod and hasattr(expr, self.printmethod): + if not (isinstance(expr, type) and issubclass(expr, Basic)): + return getattr(expr, self.printmethod)(self, **kwargs) + + # See if the class of expr is known, or if one of its super + # classes is known, and use that print function + # Exception: ignore the subclasses of Undefined, so that, e.g., + # Function('gamma') does not get dispatched to _print_gamma + classes = type(expr).__mro__ + if AppliedUndef in classes: + classes = classes[classes.index(AppliedUndef):] + if UndefinedFunction in classes: + classes = classes[classes.index(UndefinedFunction):] + # Another exception: if someone subclasses a known function, e.g., + # gamma, and changes the name, then ignore _print_gamma + if Function in classes: + i = classes.index(Function) + classes = tuple(c for c in classes[:i] if \ + c.__name__ == classes[0].__name__ or \ + c.__name__.endswith("Base")) + classes[i:] + for cls in classes: + printmethodname = '_print_' + cls.__name__ + printmethod = getattr(self, printmethodname, None) + if printmethod is not None: + return printmethod(expr, **kwargs) + # Unknown object, fall back to the emptyPrinter. + return self.emptyPrinter(expr) + finally: + self._print_level -= 1 + + def emptyPrinter(self, expr): + return str(expr) + + def _as_ordered_terms(self, expr, order=None): + """A compatibility function for ordering terms in Add. """ + order = order or self.order + + if order == 'old': + return sorted(Add.make_args(expr), key=cmp_to_key(self._compare_pretty)) + elif order == 'none': + return list(expr.args) + else: + return expr.as_ordered_terms(order=order) + + def _compare_pretty(self, a, b): + """return -1, 0, 1 if a is canonically less, equal or + greater than b. This is used when 'order=old' is selected + for printing. This puts Order last, orders Rationals + according to value, puts terms in order wrt the power of + the last power appearing in a term. Ties are broken using + Basic.compare. + """ + from sympy.core.numbers import Rational + from sympy.core.symbol import Wild + from sympy.series.order import Order + if isinstance(a, Order) and not isinstance(b, Order): + return 1 + if not isinstance(a, Order) and isinstance(b, Order): + return -1 + + if isinstance(a, Rational) and isinstance(b, Rational): + l = a.p * b.q + r = b.p * a.q + return (l > r) - (l < r) + else: + p1, p2, p3 = Wild("p1"), Wild("p2"), Wild("p3") + r_a = a.match(p1 * p2**p3) + if r_a and p3 in r_a: + a3 = r_a[p3] + r_b = b.match(p1 * p2**p3) + if r_b and p3 in r_b: + b3 = r_b[p3] + c = Basic.compare(a3, b3) + if c != 0: + return c + + # break ties + return Basic.compare(a, b) + + +class _PrintFunction: + """ + Function wrapper to replace ``**settings`` in the signature with printer defaults + """ + def __init__(self, f, print_cls: Type[Printer]): + # find all the non-setting arguments + params = list(inspect.signature(f).parameters.values()) + assert params.pop(-1).kind == inspect.Parameter.VAR_KEYWORD + self.__other_params = params + + self.__print_cls = print_cls + update_wrapper(self, f) + + def __reduce__(self): + # Since this is used as a decorator, it replaces the original function. + # The default pickling will try to pickle self.__wrapped__ and fail + # because the wrapped function can't be retrieved by name. + return self.__wrapped__.__qualname__ + + def __call__(self, *args, **kwargs): + return self.__wrapped__(*args, **kwargs) + + @property + def __signature__(self) -> inspect.Signature: + settings = self.__print_cls._get_initial_settings() + return inspect.Signature( + parameters=self.__other_params + [ + inspect.Parameter(k, inspect.Parameter.KEYWORD_ONLY, default=v) + for k, v in settings.items() + ], + return_annotation=self.__wrapped__.__annotations__.get('return', inspect.Signature.empty) # type:ignore + ) + + +def print_function(print_cls): + """ A decorator to replace kwargs with the printer settings in __signature__ """ + def decorator(f): + if sys.version_info < (3, 9): + # We have to create a subclass so that `help` actually shows the docstring in older Python versions. + # IPython and Sphinx do not need this, only a raw Python console. + cls = type(f'{f.__qualname__}_PrintFunction', (_PrintFunction,), {"__doc__": f.__doc__}) + else: + cls = _PrintFunction + return cls(f, print_cls) + return decorator diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pycode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pycode.py new file mode 100644 index 0000000000000000000000000000000000000000..09bdc6788775d409c06bdaae0a43c54544894602 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pycode.py @@ -0,0 +1,852 @@ +""" +Python code printers + +This module contains Python code printers for plain Python as well as NumPy & SciPy enabled code. +""" +from collections import defaultdict +from itertools import chain +from sympy.core import S +from sympy.core.mod import Mod +from .precedence import precedence +from .codeprinter import CodePrinter + +_kw = { + 'and', 'as', 'assert', 'break', 'class', 'continue', 'def', 'del', 'elif', + 'else', 'except', 'finally', 'for', 'from', 'global', 'if', 'import', 'in', + 'is', 'lambda', 'not', 'or', 'pass', 'raise', 'return', 'try', 'while', + 'with', 'yield', 'None', 'False', 'nonlocal', 'True' +} + +_known_functions = { + 'Abs': 'abs', + 'Min': 'min', + 'Max': 'max', +} +_known_functions_math = { + 'acos': 'acos', + 'acosh': 'acosh', + 'asin': 'asin', + 'asinh': 'asinh', + 'atan': 'atan', + 'atan2': 'atan2', + 'atanh': 'atanh', + 'ceiling': 'ceil', + 'cos': 'cos', + 'cosh': 'cosh', + 'erf': 'erf', + 'erfc': 'erfc', + 'exp': 'exp', + 'expm1': 'expm1', + 'factorial': 'factorial', + 'floor': 'floor', + 'gamma': 'gamma', + 'hypot': 'hypot', + 'isinf': 'isinf', + 'isnan': 'isnan', + 'loggamma': 'lgamma', + 'log': 'log', + 'ln': 'log', + 'log10': 'log10', + 'log1p': 'log1p', + 'log2': 'log2', + 'sin': 'sin', + 'sinh': 'sinh', + 'Sqrt': 'sqrt', + 'tan': 'tan', + 'tanh': 'tanh' +} # Not used from ``math``: [copysign isclose isfinite isinf ldexp frexp pow modf +# radians trunc fmod fsum gcd degrees fabs] +_known_constants_math = { + 'Exp1': 'e', + 'Pi': 'pi', + 'E': 'e', + 'Infinity': 'inf', + 'NaN': 'nan', + 'ComplexInfinity': 'nan' +} + +def _print_known_func(self, expr): + known = self.known_functions[expr.__class__.__name__] + return '{name}({args})'.format(name=self._module_format(known), + args=', '.join((self._print(arg) for arg in expr.args))) + + +def _print_known_const(self, expr): + known = self.known_constants[expr.__class__.__name__] + return self._module_format(known) + + +class AbstractPythonCodePrinter(CodePrinter): + printmethod = "_pythoncode" + language = "Python" + reserved_words = _kw + modules = None # initialized to a set in __init__ + tab = ' ' + _kf = dict(chain( + _known_functions.items(), + [(k, 'math.' + v) for k, v in _known_functions_math.items()] + )) + _kc = {k: 'math.'+v for k, v in _known_constants_math.items()} + _operators = {'and': 'and', 'or': 'or', 'not': 'not'} + _default_settings = dict( + CodePrinter._default_settings, + user_functions={}, + precision=17, + inline=True, + fully_qualified_modules=True, + contract=False, + standard='python3', + ) + + def __init__(self, settings=None): + super().__init__(settings) + + # Python standard handler + std = self._settings['standard'] + if std is None: + import sys + std = 'python{}'.format(sys.version_info.major) + if std != 'python3': + raise ValueError('Only Python 3 is supported.') + self.standard = std + + self.module_imports = defaultdict(set) + + # Known functions and constants handler + self.known_functions = dict(self._kf, **(settings or {}).get( + 'user_functions', {})) + self.known_constants = dict(self._kc, **(settings or {}).get( + 'user_constants', {})) + + def _declare_number_const(self, name, value): + return "%s = %s" % (name, value) + + def _module_format(self, fqn, register=True): + parts = fqn.split('.') + if register and len(parts) > 1: + self.module_imports['.'.join(parts[:-1])].add(parts[-1]) + + if self._settings['fully_qualified_modules']: + return fqn + else: + return fqn.split('(')[0].split('[')[0].split('.')[-1] + + def _format_code(self, lines): + return lines + + def _get_statement(self, codestring): + return "{}".format(codestring) + + def _get_comment(self, text): + return " # {}".format(text) + + def _expand_fold_binary_op(self, op, args): + """ + This method expands a fold on binary operations. + + ``functools.reduce`` is an example of a folded operation. + + For example, the expression + + `A + B + C + D` + + is folded into + + `((A + B) + C) + D` + """ + if len(args) == 1: + return self._print(args[0]) + else: + return "%s(%s, %s)" % ( + self._module_format(op), + self._expand_fold_binary_op(op, args[:-1]), + self._print(args[-1]), + ) + + def _expand_reduce_binary_op(self, op, args): + """ + This method expands a reduction on binary operations. + + Notice: this is NOT the same as ``functools.reduce``. + + For example, the expression + + `A + B + C + D` + + is reduced into: + + `(A + B) + (C + D)` + """ + if len(args) == 1: + return self._print(args[0]) + else: + N = len(args) + Nhalf = N // 2 + return "%s(%s, %s)" % ( + self._module_format(op), + self._expand_reduce_binary_op(args[:Nhalf]), + self._expand_reduce_binary_op(args[Nhalf:]), + ) + + def _print_NaN(self, expr): + return "float('nan')" + + def _print_Infinity(self, expr): + return "float('inf')" + + def _print_NegativeInfinity(self, expr): + return "float('-inf')" + + def _print_ComplexInfinity(self, expr): + return self._print_NaN(expr) + + def _print_Mod(self, expr): + PREC = precedence(expr) + return ('{} % {}'.format(*(self.parenthesize(x, PREC) for x in expr.args))) + + def _print_Piecewise(self, expr): + result = [] + i = 0 + for arg in expr.args: + e = arg.expr + c = arg.cond + if i == 0: + result.append('(') + result.append('(') + result.append(self._print(e)) + result.append(')') + result.append(' if ') + result.append(self._print(c)) + result.append(' else ') + i += 1 + result = result[:-1] + if result[-1] == 'True': + result = result[:-2] + result.append(')') + else: + result.append(' else None)') + return ''.join(result) + + def _print_Relational(self, expr): + "Relational printer for Equality and Unequality" + op = { + '==' :'equal', + '!=' :'not_equal', + '<' :'less', + '<=' :'less_equal', + '>' :'greater', + '>=' :'greater_equal', + } + if expr.rel_op in op: + lhs = self._print(expr.lhs) + rhs = self._print(expr.rhs) + return '({lhs} {op} {rhs})'.format(op=expr.rel_op, lhs=lhs, rhs=rhs) + return super()._print_Relational(expr) + + def _print_ITE(self, expr): + from sympy.functions.elementary.piecewise import Piecewise + return self._print(expr.rewrite(Piecewise)) + + def _print_Sum(self, expr): + loops = ( + 'for {i} in range({a}, {b}+1)'.format( + i=self._print(i), + a=self._print(a), + b=self._print(b)) + for i, a, b in expr.limits[::-1]) + return '(builtins.sum({function} {loops}))'.format( + function=self._print(expr.function), + loops=' '.join(loops)) + + def _print_ImaginaryUnit(self, expr): + return '1j' + + def _print_KroneckerDelta(self, expr): + a, b = expr.args + + return '(1 if {a} == {b} else 0)'.format( + a = self._print(a), + b = self._print(b) + ) + + def _print_MatrixBase(self, expr): + name = expr.__class__.__name__ + func = self.known_functions.get(name, name) + return "%s(%s)" % (func, self._print(expr.tolist())) + + _print_SparseRepMatrix = \ + _print_MutableSparseMatrix = \ + _print_ImmutableSparseMatrix = \ + _print_Matrix = \ + _print_DenseMatrix = \ + _print_MutableDenseMatrix = \ + _print_ImmutableMatrix = \ + _print_ImmutableDenseMatrix = \ + lambda self, expr: self._print_MatrixBase(expr) + + def _indent_codestring(self, codestring): + return '\n'.join([self.tab + line for line in codestring.split('\n')]) + + def _print_FunctionDefinition(self, fd): + body = '\n'.join((self._print(arg) for arg in fd.body)) + return "def {name}({parameters}):\n{body}".format( + name=self._print(fd.name), + parameters=', '.join([self._print(var.symbol) for var in fd.parameters]), + body=self._indent_codestring(body) + ) + + def _print_While(self, whl): + body = '\n'.join((self._print(arg) for arg in whl.body)) + return "while {cond}:\n{body}".format( + cond=self._print(whl.condition), + body=self._indent_codestring(body) + ) + + def _print_Declaration(self, decl): + return '%s = %s' % ( + self._print(decl.variable.symbol), + self._print(decl.variable.value) + ) + + def _print_BreakToken(self, bt): + return 'break' + + def _print_Return(self, ret): + arg, = ret.args + return 'return %s' % self._print(arg) + + def _print_Raise(self, rs): + arg, = rs.args + return 'raise %s' % self._print(arg) + + def _print_RuntimeError_(self, re): + message, = re.args + return "RuntimeError(%s)" % self._print(message) + + def _print_Print(self, prnt): + print_args = ', '.join((self._print(arg) for arg in prnt.print_args)) + from sympy.codegen.ast import none + if prnt.format_string != none: + print_args = '{} % ({}), end=""'.format( + self._print(prnt.format_string), + print_args + ) + if prnt.file != None: # Must be '!= None', cannot be 'is not None' + print_args += ', file=%s' % self._print(prnt.file) + return 'print(%s)' % print_args + + def _print_Stream(self, strm): + if str(strm.name) == 'stdout': + return self._module_format('sys.stdout') + elif str(strm.name) == 'stderr': + return self._module_format('sys.stderr') + else: + return self._print(strm.name) + + def _print_NoneToken(self, arg): + return 'None' + + def _hprint_Pow(self, expr, rational=False, sqrt='math.sqrt'): + """Printing helper function for ``Pow`` + + Notes + ===== + + This preprocesses the ``sqrt`` as math formatter and prints division + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.printing.pycode import PythonCodePrinter + >>> from sympy.abc import x + + Python code printer automatically looks up ``math.sqrt``. + + >>> printer = PythonCodePrinter() + >>> printer._hprint_Pow(sqrt(x), rational=True) + 'x**(1/2)' + >>> printer._hprint_Pow(sqrt(x), rational=False) + 'math.sqrt(x)' + >>> printer._hprint_Pow(1/sqrt(x), rational=True) + 'x**(-1/2)' + >>> printer._hprint_Pow(1/sqrt(x), rational=False) + '1/math.sqrt(x)' + >>> printer._hprint_Pow(1/x, rational=False) + '1/x' + >>> printer._hprint_Pow(1/x, rational=True) + 'x**(-1)' + + Using sqrt from numpy or mpmath + + >>> printer._hprint_Pow(sqrt(x), sqrt='numpy.sqrt') + 'numpy.sqrt(x)' + >>> printer._hprint_Pow(sqrt(x), sqrt='mpmath.sqrt') + 'mpmath.sqrt(x)' + + See Also + ======== + + sympy.printing.str.StrPrinter._print_Pow + """ + PREC = precedence(expr) + + if expr.exp == S.Half and not rational: + func = self._module_format(sqrt) + arg = self._print(expr.base) + return '{func}({arg})'.format(func=func, arg=arg) + + if expr.is_commutative and not rational: + if -expr.exp is S.Half: + func = self._module_format(sqrt) + num = self._print(S.One) + arg = self._print(expr.base) + return f"{num}/{func}({arg})" + if expr.exp is S.NegativeOne: + num = self._print(S.One) + arg = self.parenthesize(expr.base, PREC, strict=False) + return f"{num}/{arg}" + + + base_str = self.parenthesize(expr.base, PREC, strict=False) + exp_str = self.parenthesize(expr.exp, PREC, strict=False) + return "{}**{}".format(base_str, exp_str) + + +class ArrayPrinter: + + def _arrayify(self, indexed): + from sympy.tensor.array.expressions.from_indexed_to_array import convert_indexed_to_array + try: + return convert_indexed_to_array(indexed) + except Exception: + return indexed + + def _get_einsum_string(self, subranks, contraction_indices): + letters = self._get_letter_generator_for_einsum() + contraction_string = "" + counter = 0 + d = {j: min(i) for i in contraction_indices for j in i} + indices = [] + for rank_arg in subranks: + lindices = [] + for i in range(rank_arg): + if counter in d: + lindices.append(d[counter]) + else: + lindices.append(counter) + counter += 1 + indices.append(lindices) + mapping = {} + letters_free = [] + letters_dum = [] + for i in indices: + for j in i: + if j not in mapping: + l = next(letters) + mapping[j] = l + else: + l = mapping[j] + contraction_string += l + if j in d: + if l not in letters_dum: + letters_dum.append(l) + else: + letters_free.append(l) + contraction_string += "," + contraction_string = contraction_string[:-1] + return contraction_string, letters_free, letters_dum + + def _get_letter_generator_for_einsum(self): + for i in range(97, 123): + yield chr(i) + for i in range(65, 91): + yield chr(i) + raise ValueError("out of letters") + + def _print_ArrayTensorProduct(self, expr): + letters = self._get_letter_generator_for_einsum() + contraction_string = ",".join(["".join([next(letters) for j in range(i)]) for i in expr.subranks]) + return '%s("%s", %s)' % ( + self._module_format(self._module + "." + self._einsum), + contraction_string, + ", ".join([self._print(arg) for arg in expr.args]) + ) + + def _print_ArrayContraction(self, expr): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + base = expr.expr + contraction_indices = expr.contraction_indices + + if isinstance(base, ArrayTensorProduct): + elems = ",".join(["%s" % (self._print(arg)) for arg in base.args]) + ranks = base.subranks + else: + elems = self._print(base) + ranks = [len(base.shape)] + + contraction_string, letters_free, letters_dum = self._get_einsum_string(ranks, contraction_indices) + + if not contraction_indices: + return self._print(base) + if isinstance(base, ArrayTensorProduct): + elems = ",".join(["%s" % (self._print(arg)) for arg in base.args]) + else: + elems = self._print(base) + return "%s(\"%s\", %s)" % ( + self._module_format(self._module + "." + self._einsum), + "{}->{}".format(contraction_string, "".join(sorted(letters_free))), + elems, + ) + + def _print_ArrayDiagonal(self, expr): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + diagonal_indices = list(expr.diagonal_indices) + if isinstance(expr.expr, ArrayTensorProduct): + subranks = expr.expr.subranks + elems = expr.expr.args + else: + subranks = expr.subranks + elems = [expr.expr] + diagonal_string, letters_free, letters_dum = self._get_einsum_string(subranks, diagonal_indices) + elems = [self._print(i) for i in elems] + return '%s("%s", %s)' % ( + self._module_format(self._module + "." + self._einsum), + "{}->{}".format(diagonal_string, "".join(letters_free+letters_dum)), + ", ".join(elems) + ) + + def _print_PermuteDims(self, expr): + return "%s(%s, %s)" % ( + self._module_format(self._module + "." + self._transpose), + self._print(expr.expr), + self._print(expr.permutation.array_form), + ) + + def _print_ArrayAdd(self, expr): + return self._expand_fold_binary_op(self._module + "." + self._add, expr.args) + + def _print_OneArray(self, expr): + return "%s((%s,))" % ( + self._module_format(self._module+ "." + self._ones), + ','.join(map(self._print,expr.args)) + ) + + def _print_ZeroArray(self, expr): + return "%s((%s,))" % ( + self._module_format(self._module+ "." + self._zeros), + ','.join(map(self._print,expr.args)) + ) + + def _print_Assignment(self, expr): + #XXX: maybe this needs to happen at a higher level e.g. at _print or + #doprint? + lhs = self._print(self._arrayify(expr.lhs)) + rhs = self._print(self._arrayify(expr.rhs)) + return "%s = %s" % ( lhs, rhs ) + + def _print_IndexedBase(self, expr): + return self._print_ArraySymbol(expr) + + +class PythonCodePrinter(AbstractPythonCodePrinter): + + def _print_sign(self, e): + return '(0.0 if {e} == 0 else {f}(1, {e}))'.format( + f=self._module_format('math.copysign'), e=self._print(e.args[0])) + + def _print_Not(self, expr): + PREC = precedence(expr) + return self._operators['not'] + ' ' + self.parenthesize(expr.args[0], PREC) + + def _print_IndexedBase(self, expr): + return expr.name + + def _print_Indexed(self, expr): + base = expr.args[0] + index = expr.args[1:] + return "{}[{}]".format(str(base), ", ".join([self._print(ind) for ind in index])) + + def _print_Pow(self, expr, rational=False): + return self._hprint_Pow(expr, rational=rational) + + def _print_Rational(self, expr): + return '{}/{}'.format(expr.p, expr.q) + + def _print_Half(self, expr): + return self._print_Rational(expr) + + def _print_frac(self, expr): + return self._print_Mod(Mod(expr.args[0], 1)) + + def _print_Symbol(self, expr): + + name = super()._print_Symbol(expr) + + if name in self.reserved_words: + if self._settings['error_on_reserved']: + msg = ('This expression includes the symbol "{}" which is a ' + 'reserved keyword in this language.') + raise ValueError(msg.format(name)) + return name + self._settings['reserved_word_suffix'] + elif '{' in name: # Remove curly braces from subscripted variables + return name.replace('{', '').replace('}', '') + else: + return name + + _print_lowergamma = CodePrinter._print_not_supported + _print_uppergamma = CodePrinter._print_not_supported + _print_fresnelc = CodePrinter._print_not_supported + _print_fresnels = CodePrinter._print_not_supported + + +for k in PythonCodePrinter._kf: + setattr(PythonCodePrinter, '_print_%s' % k, _print_known_func) + +for k in _known_constants_math: + setattr(PythonCodePrinter, '_print_%s' % k, _print_known_const) + + +def pycode(expr, **settings): + """ Converts an expr to a string of Python code + + Parameters + ========== + + expr : Expr + A SymPy expression. + fully_qualified_modules : bool + Whether or not to write out full module names of functions + (``math.sin`` vs. ``sin``). default: ``True``. + standard : str or None, optional + Only 'python3' (default) is supported. + This parameter may be removed in the future. + + Examples + ======== + + >>> from sympy import pycode, tan, Symbol + >>> pycode(tan(Symbol('x')) + 1) + 'math.tan(x) + 1' + + """ + return PythonCodePrinter(settings).doprint(expr) + + +from itertools import chain +from sympy.printing.pycode import PythonCodePrinter + +_known_functions_cmath = { + 'exp': 'exp', + 'sqrt': 'sqrt', + 'log': 'log', + 'cos': 'cos', + 'sin': 'sin', + 'tan': 'tan', + 'acos': 'acos', + 'asin': 'asin', + 'atan': 'atan', + 'cosh': 'cosh', + 'sinh': 'sinh', + 'tanh': 'tanh', + 'acosh': 'acosh', + 'asinh': 'asinh', + 'atanh': 'atanh', +} + +_known_constants_cmath = { + 'Pi': 'pi', + 'E': 'e', + 'Infinity': 'inf', + 'NegativeInfinity': '-inf', +} + +class CmathPrinter(PythonCodePrinter): + """ Printer for Python's cmath module """ + printmethod = "_cmathcode" + language = "Python with cmath" + + _kf = dict(chain( + _known_functions_cmath.items() + )) + + _kc = {k: 'cmath.' + v for k, v in _known_constants_cmath.items()} + + def _print_Pow(self, expr, rational=False): + return self._hprint_Pow(expr, rational=rational, sqrt='cmath.sqrt') + + def _print_Float(self, e): + return '{func}({val})'.format(func=self._module_format('cmath.mpf'), val=self._print(e)) + + def _print_known_func(self, expr): + func_name = expr.func.__name__ + if func_name in self._kf: + return f"cmath.{self._kf[func_name]}({', '.join(map(self._print, expr.args))})" + return super()._print_Function(expr) + + def _print_known_const(self, expr): + return self._kc[expr.__class__.__name__] + + def _print_re(self, expr): + """Prints `re(z)` as `z.real`""" + return f"({self._print(expr.args[0])}).real" + + def _print_im(self, expr): + """Prints `im(z)` as `z.imag`""" + return f"({self._print(expr.args[0])}).imag" + + +for k in CmathPrinter._kf: + setattr(CmathPrinter, '_print_%s' % k, CmathPrinter._print_known_func) + +for k in _known_constants_cmath: + setattr(CmathPrinter, '_print_%s' % k, CmathPrinter._print_known_const) + + +_not_in_mpmath = 'log1p log2'.split() +_in_mpmath = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_mpmath] +_known_functions_mpmath = dict(_in_mpmath, **{ + 'beta': 'beta', + 'frac': 'frac', + 'fresnelc': 'fresnelc', + 'fresnels': 'fresnels', + 'sign': 'sign', + 'loggamma': 'loggamma', + 'hyper': 'hyper', + 'meijerg': 'meijerg', + 'besselj': 'besselj', + 'bessely': 'bessely', + 'besseli': 'besseli', + 'besselk': 'besselk', +}) +_known_constants_mpmath = { + 'Exp1': 'e', + 'Pi': 'pi', + 'GoldenRatio': 'phi', + 'EulerGamma': 'euler', + 'Catalan': 'catalan', + 'NaN': 'nan', + 'Infinity': 'inf', + 'NegativeInfinity': 'ninf' +} + + +def _unpack_integral_limits(integral_expr): + """ helper function for _print_Integral that + - accepts an Integral expression + - returns a tuple of + - a list variables of integration + - a list of tuples of the upper and lower limits of integration + """ + integration_vars = [] + limits = [] + for integration_range in integral_expr.limits: + if len(integration_range) == 3: + integration_var, lower_limit, upper_limit = integration_range + else: + raise NotImplementedError("Only definite integrals are supported") + integration_vars.append(integration_var) + limits.append((lower_limit, upper_limit)) + return integration_vars, limits + + +class MpmathPrinter(PythonCodePrinter): + """ + Lambda printer for mpmath which maintains precision for floats + """ + printmethod = "_mpmathcode" + + language = "Python with mpmath" + + _kf = dict(chain( + _known_functions.items(), + [(k, 'mpmath.' + v) for k, v in _known_functions_mpmath.items()] + )) + _kc = {k: 'mpmath.'+v for k, v in _known_constants_mpmath.items()} + + def _print_Float(self, e): + # XXX: This does not handle setting mpmath.mp.dps. It is assumed that + # the caller of the lambdified function will have set it to sufficient + # precision to match the Floats in the expression. + + # Remove 'mpz' if gmpy is installed. + args = str(tuple(map(int, e._mpf_))) + return '{func}({args})'.format(func=self._module_format('mpmath.mpf'), args=args) + + + def _print_Rational(self, e): + return "{func}({p})/{func}({q})".format( + func=self._module_format('mpmath.mpf'), + q=self._print(e.q), + p=self._print(e.p) + ) + + def _print_Half(self, e): + return self._print_Rational(e) + + def _print_uppergamma(self, e): + return "{}({}, {}, {})".format( + self._module_format('mpmath.gammainc'), + self._print(e.args[0]), + self._print(e.args[1]), + self._module_format('mpmath.inf')) + + def _print_lowergamma(self, e): + return "{}({}, 0, {})".format( + self._module_format('mpmath.gammainc'), + self._print(e.args[0]), + self._print(e.args[1])) + + def _print_log2(self, e): + return '{0}({1})/{0}(2)'.format( + self._module_format('mpmath.log'), self._print(e.args[0])) + + def _print_log1p(self, e): + return '{}({})'.format( + self._module_format('mpmath.log1p'), self._print(e.args[0])) + + def _print_Pow(self, expr, rational=False): + return self._hprint_Pow(expr, rational=rational, sqrt='mpmath.sqrt') + + def _print_Integral(self, e): + integration_vars, limits = _unpack_integral_limits(e) + + return "{}(lambda {}: {}, {})".format( + self._module_format("mpmath.quad"), + ", ".join(map(self._print, integration_vars)), + self._print(e.args[0]), + ", ".join("(%s, %s)" % tuple(map(self._print, l)) for l in limits)) + + + def _print_Derivative_zeta(self, args, seq_orders): + arg, = args + deriv_order, = seq_orders + return '{}({}, derivative={})'.format( + self._module_format('mpmath.zeta'), + self._print(arg), deriv_order + ) + + +for k in MpmathPrinter._kf: + setattr(MpmathPrinter, '_print_%s' % k, _print_known_func) + +for k in _known_constants_mpmath: + setattr(MpmathPrinter, '_print_%s' % k, _print_known_const) + + +class SymPyPrinter(AbstractPythonCodePrinter): + + language = "Python with SymPy" + + _default_settings = dict( + AbstractPythonCodePrinter._default_settings, + strict=False # any class name will per definition be what we target in SymPyPrinter. + ) + + def _print_Function(self, expr): + mod = expr.func.__module__ or '' + return '%s(%s)' % (self._module_format(mod + ('.' if mod else '') + expr.func.__name__), + ', '.join((self._print(arg) for arg in expr.args))) + + def _print_Pow(self, expr, rational=False): + return self._hprint_Pow(expr, rational=rational, sqrt='sympy.sqrt') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/python.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/python.py new file mode 100644 index 0000000000000000000000000000000000000000..2f6862574d99db90f289de65144c7122ed2d731a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/python.py @@ -0,0 +1,92 @@ +import keyword as kw +import sympy +from .repr import ReprPrinter +from .str import StrPrinter + +# A list of classes that should be printed using StrPrinter +STRPRINT = ("Add", "Infinity", "Integer", "Mul", "NegativeInfinity", "Pow") + + +class PythonPrinter(ReprPrinter, StrPrinter): + """A printer which converts an expression into its Python interpretation.""" + + def __init__(self, settings=None): + super().__init__(settings) + self.symbols = [] + self.functions = [] + + # Create print methods for classes that should use StrPrinter instead + # of ReprPrinter. + for name in STRPRINT: + f_name = "_print_%s" % name + f = getattr(StrPrinter, f_name) + setattr(PythonPrinter, f_name, f) + + def _print_Function(self, expr): + func = expr.func.__name__ + if not hasattr(sympy, func) and func not in self.functions: + self.functions.append(func) + return StrPrinter._print_Function(self, expr) + + # procedure (!) for defining symbols which have be defined in print_python() + def _print_Symbol(self, expr): + symbol = self._str(expr) + if symbol not in self.symbols: + self.symbols.append(symbol) + return StrPrinter._print_Symbol(self, expr) + + def _print_module(self, expr): + raise ValueError('Modules in the expression are unacceptable') + + +def python(expr, **settings): + """Return Python interpretation of passed expression + (can be passed to the exec() function without any modifications)""" + + printer = PythonPrinter(settings) + exprp = printer.doprint(expr) + + result = '' + # Returning found symbols and functions + renamings = {} + for symbolname in printer.symbols: + # Remove curly braces from subscripted variables + if '{' in symbolname: + newsymbolname = symbolname.replace('{', '').replace('}', '') + renamings[sympy.Symbol(symbolname)] = newsymbolname + else: + newsymbolname = symbolname + + # Escape symbol names that are reserved Python keywords + if kw.iskeyword(newsymbolname): + while True: + newsymbolname += "_" + if (newsymbolname not in printer.symbols and + newsymbolname not in printer.functions): + renamings[sympy.Symbol( + symbolname)] = sympy.Symbol(newsymbolname) + break + result += newsymbolname + ' = Symbol(\'' + symbolname + '\')\n' + + for functionname in printer.functions: + newfunctionname = functionname + # Escape function names that are reserved Python keywords + if kw.iskeyword(newfunctionname): + while True: + newfunctionname += "_" + if (newfunctionname not in printer.symbols and + newfunctionname not in printer.functions): + renamings[sympy.Function( + functionname)] = sympy.Function(newfunctionname) + break + result += newfunctionname + ' = Function(\'' + functionname + '\')\n' + + if renamings: + exprp = expr.subs(renamings) + result += 'e = ' + printer._str(exprp) + return result + + +def print_python(expr, **settings): + """Print output of python() function""" + print(python(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pytorch.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pytorch.py new file mode 100644 index 0000000000000000000000000000000000000000..0e8ff01856fa1dce7f8e786065a32bb74d987254 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/pytorch.py @@ -0,0 +1,297 @@ + +from sympy.printing.pycode import AbstractPythonCodePrinter, ArrayPrinter +from sympy.matrices.expressions import MatrixExpr +from sympy.core.mul import Mul +from sympy.printing.precedence import PRECEDENCE +from sympy.external import import_module +from sympy.codegen.cfunctions import Sqrt +from sympy import S +from sympy import Integer + +import sympy + +torch = import_module('torch') + + +class TorchPrinter(ArrayPrinter, AbstractPythonCodePrinter): + + printmethod = "_torchcode" + + mapping = { + sympy.Abs: "torch.abs", + sympy.sign: "torch.sign", + + # XXX May raise error for ints. + sympy.ceiling: "torch.ceil", + sympy.floor: "torch.floor", + sympy.log: "torch.log", + sympy.exp: "torch.exp", + Sqrt: "torch.sqrt", + sympy.cos: "torch.cos", + sympy.acos: "torch.acos", + sympy.sin: "torch.sin", + sympy.asin: "torch.asin", + sympy.tan: "torch.tan", + sympy.atan: "torch.atan", + sympy.atan2: "torch.atan2", + # XXX Also may give NaN for complex results. + sympy.cosh: "torch.cosh", + sympy.acosh: "torch.acosh", + sympy.sinh: "torch.sinh", + sympy.asinh: "torch.asinh", + sympy.tanh: "torch.tanh", + sympy.atanh: "torch.atanh", + sympy.Pow: "torch.pow", + + sympy.re: "torch.real", + sympy.im: "torch.imag", + sympy.arg: "torch.angle", + + # XXX May raise error for ints and complexes + sympy.erf: "torch.erf", + sympy.loggamma: "torch.lgamma", + + sympy.Eq: "torch.eq", + sympy.Ne: "torch.ne", + sympy.StrictGreaterThan: "torch.gt", + sympy.StrictLessThan: "torch.lt", + sympy.LessThan: "torch.le", + sympy.GreaterThan: "torch.ge", + + sympy.And: "torch.logical_and", + sympy.Or: "torch.logical_or", + sympy.Not: "torch.logical_not", + sympy.Max: "torch.max", + sympy.Min: "torch.min", + + # Matrices + sympy.MatAdd: "torch.add", + sympy.HadamardProduct: "torch.mul", + sympy.Trace: "torch.trace", + + # XXX May raise error for integer matrices. + sympy.Determinant: "torch.det", + } + + _default_settings = dict( + AbstractPythonCodePrinter._default_settings, + torch_version=None, + requires_grad=False, + dtype="torch.float64", + ) + + def __init__(self, settings=None): + super().__init__(settings) + + version = self._settings['torch_version'] + self.requires_grad = self._settings['requires_grad'] + self.dtype = self._settings['dtype'] + if version is None and torch: + version = torch.__version__ + self.torch_version = version + + def _print_Function(self, expr): + + op = self.mapping.get(type(expr), None) + if op is None: + return super()._print_Basic(expr) + children = [self._print(arg) for arg in expr.args] + if len(children) == 1: + return "%s(%s)" % ( + self._module_format(op), + children[0] + ) + else: + return self._expand_fold_binary_op(op, children) + + # mirrors the tensorflow version + _print_Expr = _print_Function + _print_Application = _print_Function + _print_MatrixExpr = _print_Function + _print_Relational = _print_Function + _print_Not = _print_Function + _print_And = _print_Function + _print_Or = _print_Function + _print_HadamardProduct = _print_Function + _print_Trace = _print_Function + _print_Determinant = _print_Function + + def _print_Inverse(self, expr): + return '{}({})'.format(self._module_format("torch.linalg.inv"), + self._print(expr.args[0])) + + def _print_Transpose(self, expr): + if expr.arg.is_Matrix and expr.arg.shape[0] == expr.arg.shape[1]: + # For square matrices, we can use the .t() method + return "{}({}).t()".format("torch.transpose", self._print(expr.arg)) + else: + # For non-square matrices or more general cases + # transpose first and second dimensions (typical matrix transpose) + return "{}.permute({})".format( + self._print(expr.arg), + ", ".join([str(i) for i in range(len(expr.arg.shape))])[::-1] + ) + + def _print_PermuteDims(self, expr): + return "%s.permute(%s)" % ( + self._print(expr.expr), + ", ".join(str(i) for i in expr.permutation.array_form) + ) + + def _print_Derivative(self, expr): + # this version handles multi-variable and mixed partial derivatives. The tensorflow version does not. + variables = expr.variables + expr_arg = expr.expr + + # Handle multi-variable or repeated derivatives + if len(variables) > 1 or ( + len(variables) == 1 and not isinstance(variables[0], tuple) and variables.count(variables[0]) > 1): + result = self._print(expr_arg) + var_groups = {} + + # Group variables by base symbol + for var in variables: + if isinstance(var, tuple): + base_var, order = var + var_groups[base_var] = var_groups.get(base_var, 0) + order + else: + var_groups[var] = var_groups.get(var, 0) + 1 + + # Apply gradients in sequence + for var, order in var_groups.items(): + for _ in range(order): + result = "torch.autograd.grad({}, {}, create_graph=True)[0]".format(result, self._print(var)) + return result + + # Handle single variable case + if len(variables) == 1: + variable = variables[0] + if isinstance(variable, tuple) and len(variable) == 2: + base_var, order = variable + if not isinstance(order, Integer): raise NotImplementedError("Only integer orders are supported") + result = self._print(expr_arg) + for _ in range(order): + result = "torch.autograd.grad({}, {}, create_graph=True)[0]".format(result, self._print(base_var)) + return result + return "torch.autograd.grad({}, {})[0]".format(self._print(expr_arg), self._print(variable)) + + return self._print(expr_arg) # Empty variables case + + def _print_Piecewise(self, expr): + from sympy import Piecewise + e, cond = expr.args[0].args + if len(expr.args) == 1: + return '{}({}, {}, {})'.format( + self._module_format("torch.where"), + self._print(cond), + self._print(e), + 0) + + return '{}({}, {}, {})'.format( + self._module_format("torch.where"), + self._print(cond), + self._print(e), + self._print(Piecewise(*expr.args[1:]))) + + def _print_Pow(self, expr): + # XXX May raise error for + # int**float or int**complex or float**complex + base, exp = expr.args + if expr.exp == S.Half: + return "{}({})".format( + self._module_format("torch.sqrt"), self._print(base)) + return "{}({}, {})".format( + self._module_format("torch.pow"), + self._print(base), self._print(exp)) + + def _print_MatMul(self, expr): + # Separate matrix and scalar arguments + mat_args = [arg for arg in expr.args if isinstance(arg, MatrixExpr)] + args = [arg for arg in expr.args if arg not in mat_args] + # Handle scalar multipliers if present + if args: + return "%s*%s" % ( + self.parenthesize(Mul.fromiter(args), PRECEDENCE["Mul"]), + self._expand_fold_binary_op("torch.matmul", mat_args) + ) + else: + return self._expand_fold_binary_op("torch.matmul", mat_args) + + def _print_MatPow(self, expr): + return self._expand_fold_binary_op("torch.mm", [expr.base]*expr.exp) + + def _print_MatrixBase(self, expr): + data = "[" + ", ".join(["[" + ", ".join([self._print(j) for j in i]) + "]" for i in expr.tolist()]) + "]" + params = [str(data)] + params.append(f"dtype={self.dtype}") + if self.requires_grad: + params.append("requires_grad=True") + + return "{}({})".format( + self._module_format("torch.tensor"), + ", ".join(params) + ) + + def _print_isnan(self, expr): + return f'torch.isnan({self._print(expr.args[0])})' + + def _print_isinf(self, expr): + return f'torch.isinf({self._print(expr.args[0])})' + + def _print_Identity(self, expr): + if all(dim.is_Integer for dim in expr.shape): + return "{}({})".format( + self._module_format("torch.eye"), + self._print(expr.shape[0]) + ) + else: + # For symbolic dimensions, fall back to a more general approach + return "{}({}, {})".format( + self._module_format("torch.eye"), + self._print(expr.shape[0]), + self._print(expr.shape[1]) + ) + + def _print_ZeroMatrix(self, expr): + return "{}({})".format( + self._module_format("torch.zeros"), + self._print(expr.shape) + ) + + def _print_OneMatrix(self, expr): + return "{}({})".format( + self._module_format("torch.ones"), + self._print(expr.shape) + ) + + def _print_conjugate(self, expr): + return f"{self._module_format('torch.conj')}({self._print(expr.args[0])})" + + def _print_ImaginaryUnit(self, expr): + return "1j" # uses the Python built-in 1j notation for the imaginary unit + + def _print_Heaviside(self, expr): + args = [self._print(expr.args[0]), "0.5"] + if len(expr.args) > 1: + args[1] = self._print(expr.args[1]) + return f"{self._module_format('torch.heaviside')}({args[0]}, {args[1]})" + + def _print_gamma(self, expr): + return f"{self._module_format('torch.special.gamma')}({self._print(expr.args[0])})" + + def _print_polygamma(self, expr): + if expr.args[0] == S.Zero: + return f"{self._module_format('torch.special.digamma')}({self._print(expr.args[1])})" + else: + raise NotImplementedError("PyTorch only supports digamma (0th order polygamma)") + + _module = "torch" + _einsum = "einsum" + _add = "add" + _transpose = "t" + _ones = "ones" + _zeros = "zeros" + +def torch_code(expr, requires_grad=False, dtype="torch.float64", **settings): + printer = TorchPrinter(settings={'requires_grad': requires_grad, 'dtype': dtype}) + return printer.doprint(expr, **settings) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rcode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rcode.py new file mode 100644 index 0000000000000000000000000000000000000000..3107e6e94d5c5acf0b2dc063e4a83af6970f6576 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rcode.py @@ -0,0 +1,402 @@ +""" +R code printer + +The RCodePrinter converts single SymPy expressions into single R expressions, +using the functions defined in math.h where possible. + + + +""" + +from __future__ import annotations +from typing import Any + +from sympy.core.numbers import equal_valued +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import precedence, PRECEDENCE +from sympy.sets.fancysets import Range + +# dictionary mapping SymPy function to (argument_conditions, C_function). +# Used in RCodePrinter._print_Function(self) +known_functions = { + #"Abs": [(lambda x: not x.is_integer, "fabs")], + "Abs": "abs", + "sin": "sin", + "cos": "cos", + "tan": "tan", + "asin": "asin", + "acos": "acos", + "atan": "atan", + "atan2": "atan2", + "exp": "exp", + "log": "log", + "erf": "erf", + "sinh": "sinh", + "cosh": "cosh", + "tanh": "tanh", + "asinh": "asinh", + "acosh": "acosh", + "atanh": "atanh", + "floor": "floor", + "ceiling": "ceiling", + "sign": "sign", + "Max": "max", + "Min": "min", + "factorial": "factorial", + "gamma": "gamma", + "digamma": "digamma", + "trigamma": "trigamma", + "beta": "beta", + "sqrt": "sqrt", # To enable automatic rewrite +} + +# These are the core reserved words in the R language. Taken from: +# https://cran.r-project.org/doc/manuals/r-release/R-lang.html#Reserved-words + +reserved_words = ['if', + 'else', + 'repeat', + 'while', + 'function', + 'for', + 'in', + 'next', + 'break', + 'TRUE', + 'FALSE', + 'NULL', + 'Inf', + 'NaN', + 'NA', + 'NA_integer_', + 'NA_real_', + 'NA_complex_', + 'NA_character_', + 'volatile'] + + +class RCodePrinter(CodePrinter): + """A printer to convert SymPy expressions to strings of R code""" + printmethod = "_rcode" + language = "R" + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 15, + 'user_functions': {}, + 'contract': True, + 'dereference': set(), + }) + _operators = { + 'and': '&', + 'or': '|', + 'not': '!', + } + + _relationals: dict[str, str] = {} + + def __init__(self, settings={}): + CodePrinter.__init__(self, settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + self._dereference = set(settings.get('dereference', [])) + self.reserved_words = set(reserved_words) + + def _rate_index_position(self, p): + return p*5 + + def _get_statement(self, codestring): + return "%s;" % codestring + + def _get_comment(self, text): + return "// {}".format(text) + + def _declare_number_const(self, name, value): + return "{} = {};".format(name, value) + + def _format_code(self, lines): + return self.indent_code(lines) + + def _traverse_matrix_indices(self, mat): + rows, cols = mat.shape + return ((i, j) for i in range(rows) for j in range(cols)) + + def _get_loop_opening_ending(self, indices): + """Returns a tuple (open_lines, close_lines) containing lists of codelines + """ + open_lines = [] + close_lines = [] + loopstart = "for (%(var)s in %(start)s:%(end)s){" + for i in indices: + # R arrays start at 1 and end at dimension + open_lines.append(loopstart % { + 'var': self._print(i.label), + 'start': self._print(i.lower+1), + 'end': self._print(i.upper + 1)}) + close_lines.append("}") + return open_lines, close_lines + + def _print_Pow(self, expr): + if "Pow" in self.known_functions: + return self._print_Function(expr) + PREC = precedence(expr) + if equal_valued(expr.exp, -1): + return '1.0/%s' % (self.parenthesize(expr.base, PREC)) + elif equal_valued(expr.exp, 0.5): + return 'sqrt(%s)' % self._print(expr.base) + else: + return '%s^%s' % (self.parenthesize(expr.base, PREC), + self.parenthesize(expr.exp, PREC)) + + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + return '%d.0/%d.0' % (p, q) + + def _print_Indexed(self, expr): + inds = [ self._print(i) for i in expr.indices ] + return "%s[%s]" % (self._print(expr.base.label), ", ".join(inds)) + + def _print_Exp1(self, expr): + return "exp(1)" + + def _print_Pi(self, expr): + return 'pi' + + def _print_Infinity(self, expr): + return 'Inf' + + def _print_NegativeInfinity(self, expr): + return '-Inf' + + def _print_Assignment(self, expr): + from sympy.codegen.ast import Assignment + + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.tensor.indexed import IndexedBase + lhs = expr.lhs + rhs = expr.rhs + # We special case assignments that take multiple lines + #if isinstance(expr.rhs, Piecewise): + # from sympy.functions.elementary.piecewise import Piecewise + # # Here we modify Piecewise so each expression is now + # # an Assignment, and then continue on the print. + # expressions = [] + # conditions = [] + # for (e, c) in rhs.args: + # expressions.append(Assignment(lhs, e)) + # conditions.append(c) + # temp = Piecewise(*zip(expressions, conditions)) + # return self._print(temp) + #elif isinstance(lhs, MatrixSymbol): + if isinstance(lhs, MatrixSymbol): + # Here we form an Assignment for each element in the array, + # printing each one. + lines = [] + for (i, j) in self._traverse_matrix_indices(lhs): + temp = Assignment(lhs[i, j], rhs[i, j]) + code0 = self._print(temp) + lines.append(code0) + return "\n".join(lines) + elif self._settings["contract"] and (lhs.has(IndexedBase) or + rhs.has(IndexedBase)): + # Here we check if there is looping to be done, and if so + # print the required loops. + return self._doprint_loops(rhs, lhs) + else: + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + return self._get_statement("%s = %s" % (lhs_code, rhs_code)) + + def _print_Piecewise(self, expr): + # This method is called only for inline if constructs + # Top level piecewise is handled in doprint() + if expr.args[-1].cond == True: + last_line = "%s" % self._print(expr.args[-1].expr) + else: + last_line = "ifelse(%s,%s,NA)" % (self._print(expr.args[-1].cond), self._print(expr.args[-1].expr)) + code=last_line + for e, c in reversed(expr.args[:-1]): + code= "ifelse(%s,%s," % (self._print(c), self._print(e))+code+")" + return(code) + + def _print_ITE(self, expr): + from sympy.functions import Piecewise + return self._print(expr.rewrite(Piecewise)) + + def _print_MatrixElement(self, expr): + return "{}[{}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"], + strict=True), expr.j + expr.i*expr.parent.shape[1]) + + def _print_Symbol(self, expr): + name = super()._print_Symbol(expr) + if expr in self._dereference: + return '(*{})'.format(name) + else: + return name + + def _print_Relational(self, expr): + lhs_code = self._print(expr.lhs) + rhs_code = self._print(expr.rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_AugmentedAssignment(self, expr): + lhs_code = self._print(expr.lhs) + op = expr.op + rhs_code = self._print(expr.rhs) + return "{} {} {};".format(lhs_code, op, rhs_code) + + def _print_For(self, expr): + target = self._print(expr.target) + if isinstance(expr.iterable, Range): + start, stop, step = expr.iterable.args + else: + raise NotImplementedError("Only iterable currently supported is Range") + body = self._print(expr.body) + return 'for({target} in seq(from={start}, to={stop}, by={step}){{\n{body}\n}}'.format(target=target, start=start, + stop=stop-1, step=step, body=body) + + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_token = ('{', '(', '{\n', '(\n') + dec_token = ('}', ')') + + code = [ line.lstrip(' \t') for line in code ] + + increase = [ int(any(map(line.endswith, inc_token))) for line in code ] + decrease = [ int(any(map(line.startswith, dec_token))) + for line in code ] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty + + +def rcode(expr, assign_to=None, **settings): + """Converts an expr to a string of r code + + Parameters + ========== + + expr : Expr + A SymPy expression to be converted. + assign_to : optional + When given, the argument is used as the name of the variable to which + the expression is assigned. Can be a string, ``Symbol``, + ``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of + line-wrapping, or for expressions that generate multi-line statements. + precision : integer, optional + The precision for numbers such as pi [default=15]. + user_functions : dict, optional + A dictionary where the keys are string representations of either + ``FunctionClass`` or ``UndefinedFunction`` instances and the values + are their desired R string representations. Alternatively, the + dictionary value can be a list of tuples i.e. [(argument_test, + rfunction_string)] or [(argument_test, rfunction_formater)]. See below + for examples. + human : bool, optional + If True, the result is a single string that may contain some constant + declarations for the number symbols. If False, the same information is + returned in a tuple of (symbols_to_declare, not_supported_functions, + code_text). [default=True]. + contract: bool, optional + If True, ``Indexed`` instances are assumed to obey tensor contraction + rules and the corresponding nested loops over indices are generated. + Setting contract=False will not generate loops, instead the user is + responsible to provide values for the indices in the code. + [default=True]. + + Examples + ======== + + >>> from sympy import rcode, symbols, Rational, sin, ceiling, Abs, Function + >>> x, tau = symbols("x, tau") + >>> rcode((2*tau)**Rational(7, 2)) + '8*sqrt(2)*tau^(7.0/2.0)' + >>> rcode(sin(x), assign_to="s") + 's = sin(x);' + + Simple custom printing can be defined for certain types by passing a + dictionary of {"type" : "function"} to the ``user_functions`` kwarg. + Alternatively, the dictionary value can be a list of tuples i.e. + [(argument_test, cfunction_string)]. + + >>> custom_functions = { + ... "ceiling": "CEIL", + ... "Abs": [(lambda x: not x.is_integer, "fabs"), + ... (lambda x: x.is_integer, "ABS")], + ... "func": "f" + ... } + >>> func = Function('func') + >>> rcode(func(Abs(x) + ceiling(x)), user_functions=custom_functions) + 'f(fabs(x) + CEIL(x))' + + or if the R-function takes a subset of the original arguments: + + >>> rcode(2**x + 3**x, user_functions={'Pow': [ + ... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e), + ... (lambda b, e: b != 2, 'pow')]}) + 'exp2(x) + pow(3, x)' + + ``Piecewise`` expressions are converted into conditionals. If an + ``assign_to`` variable is provided an if statement is created, otherwise + the ternary operator is used. Note that if the ``Piecewise`` lacks a + default term, represented by ``(expr, True)`` then an error will be thrown. + This is to prevent generating an expression that may not evaluate to + anything. + + >>> from sympy import Piecewise + >>> expr = Piecewise((x + 1, x > 0), (x, True)) + >>> print(rcode(expr, assign_to=tau)) + tau = ifelse(x > 0,x + 1,x); + + Support for loops is provided through ``Indexed`` types. With + ``contract=True`` these expressions will be turned into loops, whereas + ``contract=False`` will just print the assignment expression that should be + looped over: + + >>> from sympy import Eq, IndexedBase, Idx + >>> len_y = 5 + >>> y = IndexedBase('y', shape=(len_y,)) + >>> t = IndexedBase('t', shape=(len_y,)) + >>> Dy = IndexedBase('Dy', shape=(len_y-1,)) + >>> i = Idx('i', len_y-1) + >>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i])) + >>> rcode(e.rhs, assign_to=e.lhs, contract=False) + 'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);' + + Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions + must be provided to ``assign_to``. Note that any expression that can be + generated normally can also exist inside a Matrix: + + >>> from sympy import Matrix, MatrixSymbol + >>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)]) + >>> A = MatrixSymbol('A', 3, 1) + >>> print(rcode(mat, A)) + A[0] = x^2; + A[1] = ifelse(x > 0,x + 1,x); + A[2] = sin(x); + + """ + + return RCodePrinter(settings).doprint(expr, assign_to) + + +def print_rcode(expr, **settings): + """Prints R representation of the given expression.""" + print(rcode(expr, **settings)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/repr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/repr.py new file mode 100644 index 0000000000000000000000000000000000000000..0a4b756abbab77c3eb0fd77ee1f0bd97382c36fb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/repr.py @@ -0,0 +1,339 @@ +""" +A Printer for generating executable code. + +The most important function here is srepr that returns a string so that the +relation eval(srepr(expr))=expr holds in an appropriate environment. +""" + +from __future__ import annotations +from typing import Any + +from sympy.core.function import AppliedUndef +from sympy.core.mul import Mul +from mpmath.libmp import repr_dps, to_str as mlib_to_str + +from .printer import Printer, print_function + + +class ReprPrinter(Printer): + printmethod = "_sympyrepr" + + _default_settings: dict[str, Any] = { + "order": None, + "perm_cyclic" : True, + } + + def reprify(self, args, sep): + """ + Prints each item in `args` and joins them with `sep`. + """ + return sep.join([self.doprint(item) for item in args]) + + def emptyPrinter(self, expr): + """ + The fallback printer. + """ + if isinstance(expr, str): + return expr + elif hasattr(expr, "__srepr__"): + return expr.__srepr__() + elif hasattr(expr, "args") and hasattr(expr.args, "__iter__"): + l = [] + for o in expr.args: + l.append(self._print(o)) + return expr.__class__.__name__ + '(%s)' % ', '.join(l) + elif hasattr(expr, "__module__") and hasattr(expr, "__name__"): + return "<'%s.%s'>" % (expr.__module__, expr.__name__) + else: + return str(expr) + + def _print_Add(self, expr, order=None): + args = self._as_ordered_terms(expr, order=order) + args = map(self._print, args) + clsname = type(expr).__name__ + return clsname + "(%s)" % ", ".join(args) + + def _print_Cycle(self, expr): + return expr.__repr__() + + def _print_Permutation(self, expr): + from sympy.combinatorics.permutations import Permutation, Cycle + from sympy.utilities.exceptions import sympy_deprecation_warning + + perm_cyclic = Permutation.print_cyclic + if perm_cyclic is not None: + sympy_deprecation_warning( + f""" + Setting Permutation.print_cyclic is deprecated. Instead use + init_printing(perm_cyclic={perm_cyclic}). + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-permutation-print_cyclic", + stacklevel=7, + ) + else: + perm_cyclic = self._settings.get("perm_cyclic", True) + + if perm_cyclic: + if not expr.size: + return 'Permutation()' + # before taking Cycle notation, see if the last element is + # a singleton and move it to the head of the string + s = Cycle(expr)(expr.size - 1).__repr__()[len('Cycle'):] + last = s.rfind('(') + if not last == 0 and ',' not in s[last:]: + s = s[last:] + s[:last] + return 'Permutation%s' %s + else: + s = expr.support() + if not s: + if expr.size < 5: + return 'Permutation(%s)' % str(expr.array_form) + return 'Permutation([], size=%s)' % expr.size + trim = str(expr.array_form[:s[-1] + 1]) + ', size=%s' % expr.size + use = full = str(expr.array_form) + if len(trim) < len(full): + use = trim + return 'Permutation(%s)' % use + + def _print_Function(self, expr): + r = self._print(expr.func) + r += '(%s)' % ', '.join([self._print(a) for a in expr.args]) + return r + + def _print_Heaviside(self, expr): + # Same as _print_Function but uses pargs to suppress default value for + # 2nd arg. + r = self._print(expr.func) + r += '(%s)' % ', '.join([self._print(a) for a in expr.pargs]) + return r + + def _print_FunctionClass(self, expr): + if issubclass(expr, AppliedUndef): + return 'Function(%r)' % (expr.__name__) + else: + return expr.__name__ + + def _print_Half(self, expr): + return 'Rational(1, 2)' + + def _print_RationalConstant(self, expr): + return str(expr) + + def _print_AtomicExpr(self, expr): + return str(expr) + + def _print_NumberSymbol(self, expr): + return str(expr) + + def _print_Integer(self, expr): + return 'Integer(%i)' % expr.p + + def _print_Complexes(self, expr): + return 'Complexes' + + def _print_Integers(self, expr): + return 'Integers' + + def _print_Naturals(self, expr): + return 'Naturals' + + def _print_Naturals0(self, expr): + return 'Naturals0' + + def _print_Rationals(self, expr): + return 'Rationals' + + def _print_Reals(self, expr): + return 'Reals' + + def _print_EmptySet(self, expr): + return 'EmptySet' + + def _print_UniversalSet(self, expr): + return 'UniversalSet' + + def _print_EmptySequence(self, expr): + return 'EmptySequence' + + def _print_list(self, expr): + return "[%s]" % self.reprify(expr, ", ") + + def _print_dict(self, expr): + sep = ", " + dict_kvs = ["%s: %s" % (self.doprint(key), self.doprint(value)) for key, value in expr.items()] + return "{%s}" % sep.join(dict_kvs) + + def _print_set(self, expr): + if not expr: + return "set()" + return "{%s}" % self.reprify(expr, ", ") + + def _print_MatrixBase(self, expr): + # special case for some empty matrices + if (expr.rows == 0) ^ (expr.cols == 0): + return '%s(%s, %s, %s)' % (expr.__class__.__name__, + self._print(expr.rows), + self._print(expr.cols), + self._print([])) + l = [] + for i in range(expr.rows): + l.append([]) + for j in range(expr.cols): + l[-1].append(expr[i, j]) + return '%s(%s)' % (expr.__class__.__name__, self._print(l)) + + def _print_BooleanTrue(self, expr): + return "true" + + def _print_BooleanFalse(self, expr): + return "false" + + def _print_NaN(self, expr): + return "nan" + + def _print_Mul(self, expr, order=None): + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + # use make_args in case expr was something like -x -> x + args = Mul.make_args(expr) + + args = map(self._print, args) + clsname = type(expr).__name__ + return clsname + "(%s)" % ", ".join(args) + + def _print_Rational(self, expr): + return 'Rational(%s, %s)' % (self._print(expr.p), self._print(expr.q)) + + def _print_PythonRational(self, expr): + return "%s(%d, %d)" % (expr.__class__.__name__, expr.p, expr.q) + + def _print_Fraction(self, expr): + return 'Fraction(%s, %s)' % (self._print(expr.numerator), self._print(expr.denominator)) + + def _print_Float(self, expr): + r = mlib_to_str(expr._mpf_, repr_dps(expr._prec)) + return "%s('%s', precision=%i)" % (expr.__class__.__name__, r, expr._prec) + + def _print_Sum2(self, expr): + return "Sum2(%s, (%s, %s, %s))" % (self._print(expr.f), self._print(expr.i), + self._print(expr.a), self._print(expr.b)) + + def _print_Str(self, s): + return "%s(%s)" % (s.__class__.__name__, self._print(s.name)) + + def _print_Symbol(self, expr): + d = expr._assumptions_orig + # print the dummy_index like it was an assumption + if expr.is_Dummy: + d = d.copy() + d['dummy_index'] = expr.dummy_index + + if d == {}: + return "%s(%s)" % (expr.__class__.__name__, self._print(expr.name)) + else: + attr = ['%s=%s' % (k, v) for k, v in d.items()] + return "%s(%s, %s)" % (expr.__class__.__name__, + self._print(expr.name), ', '.join(attr)) + + def _print_CoordinateSymbol(self, expr): + d = expr._assumptions.generator + + if d == {}: + return "%s(%s, %s)" % ( + expr.__class__.__name__, + self._print(expr.coord_sys), + self._print(expr.index) + ) + else: + attr = ['%s=%s' % (k, v) for k, v in d.items()] + return "%s(%s, %s, %s)" % ( + expr.__class__.__name__, + self._print(expr.coord_sys), + self._print(expr.index), + ', '.join(attr) + ) + + def _print_Predicate(self, expr): + return "Q.%s" % expr.name + + def _print_AppliedPredicate(self, expr): + # will be changed to just expr.args when args overriding is removed + args = expr._args + return "%s(%s)" % (expr.__class__.__name__, self.reprify(args, ", ")) + + def _print_str(self, expr): + return repr(expr) + + def _print_tuple(self, expr): + if len(expr) == 1: + return "(%s,)" % self._print(expr[0]) + else: + return "(%s)" % self.reprify(expr, ", ") + + def _print_WildFunction(self, expr): + return "%s('%s')" % (expr.__class__.__name__, expr.name) + + def _print_AlgebraicNumber(self, expr): + return "%s(%s, %s)" % (expr.__class__.__name__, + self._print(expr.root), self._print(expr.coeffs())) + + def _print_PolyRing(self, ring): + return "%s(%s, %s, %s)" % (ring.__class__.__name__, + self._print(ring.symbols), self._print(ring.domain), self._print(ring.order)) + + def _print_FracField(self, field): + return "%s(%s, %s, %s)" % (field.__class__.__name__, + self._print(field.symbols), self._print(field.domain), self._print(field.order)) + + def _print_PolyElement(self, poly): + terms = list(poly.terms()) + terms.sort(key=poly.ring.order, reverse=True) + return "%s(%s, %s)" % (poly.__class__.__name__, self._print(poly.ring), self._print(terms)) + + def _print_FracElement(self, frac): + numer_terms = list(frac.numer.terms()) + numer_terms.sort(key=frac.field.order, reverse=True) + denom_terms = list(frac.denom.terms()) + denom_terms.sort(key=frac.field.order, reverse=True) + numer = self._print(numer_terms) + denom = self._print(denom_terms) + return "%s(%s, %s, %s)" % (frac.__class__.__name__, self._print(frac.field), numer, denom) + + def _print_FractionField(self, domain): + cls = domain.__class__.__name__ + field = self._print(domain.field) + return "%s(%s)" % (cls, field) + + def _print_PolynomialRingBase(self, ring): + cls = ring.__class__.__name__ + dom = self._print(ring.domain) + gens = ', '.join(map(self._print, ring.gens)) + order = str(ring.order) + if order != ring.default_order: + orderstr = ", order=" + order + else: + orderstr = "" + return "%s(%s, %s%s)" % (cls, dom, gens, orderstr) + + def _print_DMP(self, p): + cls = p.__class__.__name__ + rep = self._print(p.to_list()) + dom = self._print(p.dom) + return "%s(%s, %s)" % (cls, rep, dom) + + def _print_MonogenicFiniteExtension(self, ext): + # The expanded tree shown by srepr(ext.modulus) + # is not practical. + return "FiniteExtension(%s)" % str(ext.modulus) + + def _print_ExtensionElement(self, f): + rep = self._print(f.rep) + ext = self._print(f.ext) + return "ExtElem(%s, %s)" % (rep, ext) + +@print_function(ReprPrinter) +def srepr(expr, **settings): + """return expr in repr form""" + return ReprPrinter(settings).doprint(expr) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rust.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rust.py new file mode 100644 index 0000000000000000000000000000000000000000..5bfd481bec6b7350df281accfb9b7a598cf05baa --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/rust.py @@ -0,0 +1,637 @@ +""" +Rust code printer + +The `RustCodePrinter` converts SymPy expressions into Rust expressions. + +A complete code generator, which uses `rust_code` extensively, can be found +in `sympy.utilities.codegen`. The `codegen` module can be used to generate +complete source code files. + +""" + +# Possible Improvement +# +# * make sure we follow Rust Style Guidelines_ +# * make use of pattern matching +# * better support for reference +# * generate generic code and use trait to make sure they have specific methods +# * use crates_ to get more math support +# - num_ +# + BigInt_, BigUint_ +# + Complex_ +# + Rational64_, Rational32_, BigRational_ +# +# .. _crates: https://crates.io/ +# .. _Guidelines: https://github.com/rust-lang/rust/tree/master/src/doc/style +# .. _num: http://rust-num.github.io/num/num/ +# .. _BigInt: http://rust-num.github.io/num/num/bigint/struct.BigInt.html +# .. _BigUint: http://rust-num.github.io/num/num/bigint/struct.BigUint.html +# .. _Complex: http://rust-num.github.io/num/num/complex/struct.Complex.html +# .. _Rational32: http://rust-num.github.io/num/num/rational/type.Rational32.html +# .. _Rational64: http://rust-num.github.io/num/num/rational/type.Rational64.html +# .. _BigRational: http://rust-num.github.io/num/num/rational/type.BigRational.html + +from __future__ import annotations +from functools import reduce +import operator +from typing import Any + +from sympy.codegen.ast import ( + float32, float64, int32, + real, integer, bool_ +) +from sympy.core import S, Rational, Float, Lambda +from sympy.core.expr import Expr +from sympy.core.numbers import equal_valued +from sympy.functions.elementary.integers import ceiling, floor +from sympy.printing.codeprinter import CodePrinter +from sympy.printing.precedence import PRECEDENCE + +# Rust's methods for integer and float can be found at here : +# +# * `Rust - Primitive Type f64 `_ +# * `Rust - Primitive Type i64 `_ +# +# Function Style : +# +# 1. args[0].func(args[1:]), method with arguments +# 2. args[0].func(), method without arguments +# 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) +# 4. func(args), function with arguments + +# dictionary mapping SymPy function to (argument_conditions, Rust_function). +# Used in RustCodePrinter._print_Function(self) + +class float_floor(floor): + """ + Same as `sympy.floor`, but mimics the Rust behavior of returning a float rather than an integer + """ + def _eval_is_integer(self): + return False + +class float_ceiling(ceiling): + """ + Same as `sympy.ceiling`, but mimics the Rust behavior of returning a float rather than an integer + """ + def _eval_is_integer(self): + return False + + +function_overrides = { + "floor": (floor, float_floor), + "ceiling": (ceiling, float_ceiling), +} + +# f64 method in Rust +known_functions = { + # "": "is_nan", + # "": "is_infinite", + # "": "is_finite", + # "": "is_normal", + # "": "classify", + "float_floor": "floor", + "float_ceiling": "ceil", + # "": "round", + # "": "trunc", + # "": "fract", + "Abs": "abs", + # "": "signum", + # "": "is_sign_positive", + # "": "is_sign_negative", + # "": "mul_add", + "Pow": [(lambda base, exp: equal_valued(exp, -1), "recip", 2), # 1.0/x + (lambda base, exp: equal_valued(exp, 0.5), "sqrt", 2), # x ** 0.5 + (lambda base, exp: equal_valued(exp, -0.5), "sqrt().recip", 2), # 1/(x ** 0.5) + (lambda base, exp: exp == Rational(1, 3), "cbrt", 2), # x ** (1/3) + (lambda base, exp: equal_valued(base, 2), "exp2", 3), # 2 ** x + (lambda base, exp: exp.is_integer, "powi", 1), # x ** y, for i32 + (lambda base, exp: not exp.is_integer, "powf", 1)], # x ** y, for f64 + "exp": [(lambda exp: True, "exp", 2)], # e ** x + "log": "ln", + # "": "log", # number.log(base) + # "": "log2", + # "": "log10", + # "": "to_degrees", + # "": "to_radians", + "Max": "max", + "Min": "min", + # "": "hypot", # (x**2 + y**2) ** 0.5 + "sin": "sin", + "cos": "cos", + "tan": "tan", + "asin": "asin", + "acos": "acos", + "atan": "atan", + "atan2": "atan2", + # "": "sin_cos", + # "": "exp_m1", # e ** x - 1 + # "": "ln_1p", # ln(1 + x) + "sinh": "sinh", + "cosh": "cosh", + "tanh": "tanh", + "asinh": "asinh", + "acosh": "acosh", + "atanh": "atanh", + "sqrt": "sqrt", # To enable automatic rewrites +} + +# i64 method in Rust +# known_functions_i64 = { +# "": "min_value", +# "": "max_value", +# "": "from_str_radix", +# "": "count_ones", +# "": "count_zeros", +# "": "leading_zeros", +# "": "trainling_zeros", +# "": "rotate_left", +# "": "rotate_right", +# "": "swap_bytes", +# "": "from_be", +# "": "from_le", +# "": "to_be", # to big endian +# "": "to_le", # to little endian +# "": "checked_add", +# "": "checked_sub", +# "": "checked_mul", +# "": "checked_div", +# "": "checked_rem", +# "": "checked_neg", +# "": "checked_shl", +# "": "checked_shr", +# "": "checked_abs", +# "": "saturating_add", +# "": "saturating_sub", +# "": "saturating_mul", +# "": "wrapping_add", +# "": "wrapping_sub", +# "": "wrapping_mul", +# "": "wrapping_div", +# "": "wrapping_rem", +# "": "wrapping_neg", +# "": "wrapping_shl", +# "": "wrapping_shr", +# "": "wrapping_abs", +# "": "overflowing_add", +# "": "overflowing_sub", +# "": "overflowing_mul", +# "": "overflowing_div", +# "": "overflowing_rem", +# "": "overflowing_neg", +# "": "overflowing_shl", +# "": "overflowing_shr", +# "": "overflowing_abs", +# "Pow": "pow", +# "Abs": "abs", +# "sign": "signum", +# "": "is_positive", +# "": "is_negnative", +# } + +# These are the core reserved words in the Rust language. Taken from: +# https://doc.rust-lang.org/reference/keywords.html + +reserved_words = ['abstract', + 'as', + 'async', + 'await', + 'become', + 'box', + 'break', + 'const', + 'continue', + 'crate', + 'do', + 'dyn', + 'else', + 'enum', + 'extern', + 'false', + 'final', + 'fn', + 'for', + 'gen', + 'if', + 'impl', + 'in', + 'let', + 'loop', + 'macro', + 'match', + 'mod', + 'move', + 'mut', + 'override', + 'priv', + 'pub', + 'ref', + 'return', + 'Self', + 'self', + 'static', + 'struct', + 'super', + 'trait', + 'true', + 'try', + 'type', + 'typeof', + 'unsafe', + 'unsized', + 'use', + 'virtual', + 'where', + 'while', + 'yield'] + + +class TypeCast(Expr): + """ + The type casting operator of the Rust language. + """ + + def __init__(self, expr, type_) -> None: + super().__init__() + self.explicit = expr.is_integer and type_ is not integer + self._assumptions = expr._assumptions + if self.explicit: + setattr(self, 'precedence', PRECEDENCE["Func"] + 10) + + @property + def expr(self): + return self.args[0] + + @property + def type_(self): + return self.args[1] + + def sort_key(self, order=None): + return self.args[0].sort_key(order=order) + + +class RustCodePrinter(CodePrinter): + """A printer to convert SymPy expressions to strings of Rust code""" + printmethod = "_rust_code" + language = "Rust" + + type_aliases = { + integer: int32, + real: float64, + } + + type_mappings = { + int32: 'i32', + float32: 'f32', + float64: 'f64', + bool_: 'bool' + } + + _default_settings: dict[str, Any] = dict(CodePrinter._default_settings, **{ + 'precision': 17, + 'user_functions': {}, + 'contract': True, + 'dereference': set(), + }) + + def __init__(self, settings={}): + CodePrinter.__init__(self, settings) + self.known_functions = dict(known_functions) + userfuncs = settings.get('user_functions', {}) + self.known_functions.update(userfuncs) + self._dereference = set(settings.get('dereference', [])) + self.reserved_words = set(reserved_words) + self.function_overrides = function_overrides + + def _rate_index_position(self, p): + return p*5 + + def _get_statement(self, codestring): + return "%s;" % codestring + + def _get_comment(self, text): + return "// %s" % text + + def _declare_number_const(self, name, value): + type_ = self.type_mappings[self.type_aliases[real]] + return "const %s: %s = %s;" % (name, type_, value) + + def _format_code(self, lines): + return self.indent_code(lines) + + def _traverse_matrix_indices(self, mat): + rows, cols = mat.shape + return ((i, j) for i in range(rows) for j in range(cols)) + + def _get_loop_opening_ending(self, indices): + open_lines = [] + close_lines = [] + loopstart = "for %(var)s in %(start)s..%(end)s {" + for i in indices: + # Rust arrays start at 0 and end at dimension-1 + open_lines.append(loopstart % { + 'var': self._print(i), + 'start': self._print(i.lower), + 'end': self._print(i.upper + 1)}) + close_lines.append("}") + return open_lines, close_lines + + def _print_caller_var(self, expr): + if len(expr.args) > 1: + # for something like `sin(x + y + z)`, + # make sure we can get '(x + y + z).sin()' + # instead of 'x + y + z.sin()' + return '(' + self._print(expr) + ')' + elif expr.is_number: + return self._print(expr, _type=True) + else: + return self._print(expr) + + def _print_Function(self, expr): + """ + basic function for printing `Function` + + Function Style : + + 1. args[0].func(args[1:]), method with arguments + 2. args[0].func(), method without arguments + 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp()) + 4. func(args), function with arguments + """ + + if expr.func.__name__ in self.known_functions: + cond_func = self.known_functions[expr.func.__name__] + func = None + style = 1 + if isinstance(cond_func, str): + func = cond_func + else: + for cond, func, style in cond_func: + if cond(*expr.args): + break + if func is not None: + if style == 1: + ret = "%(var)s.%(method)s(%(args)s)" % { + 'var': self._print_caller_var(expr.args[0]), + 'method': func, + 'args': self.stringify(expr.args[1:], ", ") if len(expr.args) > 1 else '' + } + elif style == 2: + ret = "%(var)s.%(method)s()" % { + 'var': self._print_caller_var(expr.args[0]), + 'method': func, + } + elif style == 3: + ret = "%(var)s.%(method)s()" % { + 'var': self._print_caller_var(expr.args[1]), + 'method': func, + } + else: + ret = "%(func)s(%(args)s)" % { + 'func': func, + 'args': self.stringify(expr.args, ", "), + } + return ret + elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda): + # inlined function + return self._print(expr._imp_(*expr.args)) + else: + return self._print_not_supported(expr) + + def _print_Mul(self, expr): + contains_floats = any(arg.is_real and not arg.is_integer for arg in expr.args) + if contains_floats: + expr = reduce(operator.mul,(self._cast_to_float(arg) if arg != -1 else arg for arg in expr.args)) + + return super()._print_Mul(expr) + + def _print_Add(self, expr, order=None): + contains_floats = any(arg.is_real and not arg.is_integer for arg in expr.args) + if contains_floats: + expr = reduce(operator.add, (self._cast_to_float(arg) for arg in expr.args)) + + return super()._print_Add(expr, order) + + def _print_Pow(self, expr): + if expr.base.is_integer and not expr.exp.is_integer: + expr = type(expr)(Float(expr.base), expr.exp) + return self._print(expr) + return self._print_Function(expr) + + def _print_TypeCast(self, expr): + if not expr.explicit: + return self._print(expr.expr) + else: + return self._print(expr.expr) + ' as %s' % self.type_mappings[self.type_aliases[expr.type_]] + + def _print_Float(self, expr, _type=False): + ret = super()._print_Float(expr) + if _type: + return ret + '_%s' % self.type_mappings[self.type_aliases[real]] + else: + return ret + + def _print_Integer(self, expr, _type=False): + ret = super()._print_Integer(expr) + if _type: + return ret + '_%s' % self.type_mappings[self.type_aliases[integer]] + else: + return ret + + def _print_Rational(self, expr): + p, q = int(expr.p), int(expr.q) + float_suffix = self.type_mappings[self.type_aliases[real]] + return '%d_%s/%d.0' % (p, float_suffix, q) + + def _print_Relational(self, expr): + if (expr.lhs.is_integer and not expr.rhs.is_integer) or (expr.rhs.is_integer and not expr.lhs.is_integer): + lhs = self._cast_to_float(expr.lhs) + rhs = self._cast_to_float(expr.rhs) + else: + lhs = expr.lhs + rhs = expr.rhs + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + op = expr.rel_op + return "{} {} {}".format(lhs_code, op, rhs_code) + + def _print_Indexed(self, expr): + # calculate index for 1d array + dims = expr.shape + elem = S.Zero + offset = S.One + for i in reversed(range(expr.rank)): + elem += expr.indices[i]*offset + offset *= dims[i] + return "%s[%s]" % (self._print(expr.base.label), self._print(elem)) + + def _print_Idx(self, expr): + return expr.label.name + + def _print_Dummy(self, expr): + return expr.name + + def _print_Exp1(self, expr, _type=False): + return "E" + + def _print_Pi(self, expr, _type=False): + return 'PI' + + def _print_Infinity(self, expr, _type=False): + return 'INFINITY' + + def _print_NegativeInfinity(self, expr, _type=False): + return 'NEG_INFINITY' + + def _print_BooleanTrue(self, expr, _type=False): + return "true" + + def _print_BooleanFalse(self, expr, _type=False): + return "false" + + def _print_bool(self, expr, _type=False): + return str(expr).lower() + + def _print_NaN(self, expr, _type=False): + return "NAN" + + def _print_Piecewise(self, expr): + if expr.args[-1].cond != True: + # We need the last conditional to be a True, otherwise the resulting + # function may not return a result. + raise ValueError("All Piecewise expressions must contain an " + "(expr, True) statement to be used as a default " + "condition. Without one, the generated " + "expression may not evaluate to anything under " + "some condition.") + lines = [] + + for i, (e, c) in enumerate(expr.args): + if i == 0: + lines.append("if (%s) {" % self._print(c)) + elif i == len(expr.args) - 1 and c == True: + lines[-1] += " else {" + else: + lines[-1] += " else if (%s) {" % self._print(c) + code0 = self._print(e) + lines.append(code0) + lines.append("}") + + if self._settings['inline']: + return " ".join(lines) + else: + return "\n".join(lines) + + def _print_ITE(self, expr): + from sympy.functions import Piecewise + return self._print(expr.rewrite(Piecewise, deep=False)) + + def _print_MatrixBase(self, A): + if A.cols == 1: + return "[%s]" % ", ".join(self._print(a) for a in A) + else: + raise ValueError("Full Matrix Support in Rust need Crates (https://crates.io/keywords/matrix).") + + def _print_SparseRepMatrix(self, mat): + # do not allow sparse matrices to be made dense + return self._print_not_supported(mat) + + def _print_MatrixElement(self, expr): + return "%s[%s]" % (expr.parent, + expr.j + expr.i*expr.parent.shape[1]) + + def _print_Symbol(self, expr): + + name = super()._print_Symbol(expr) + + if expr in self._dereference: + return '(*%s)' % name + else: + return name + + def _print_Assignment(self, expr): + from sympy.tensor.indexed import IndexedBase + lhs = expr.lhs + rhs = expr.rhs + if self._settings["contract"] and (lhs.has(IndexedBase) or + rhs.has(IndexedBase)): + # Here we check if there is looping to be done, and if so + # print the required loops. + return self._doprint_loops(rhs, lhs) + else: + lhs_code = self._print(lhs) + rhs_code = self._print(rhs) + return self._get_statement("%s = %s" % (lhs_code, rhs_code)) + + def _print_sign(self, expr): + arg = self._print(expr.args[0]) + return "(if (%s == 0.0) { 0.0 } else { (%s).signum() })" % (arg, arg) + + def _cast_to_float(self, expr): + if not expr.is_number: + return TypeCast(expr, real) + elif expr.is_integer: + return Float(expr) + return expr + + def _can_print(self, name): + """ Check if function ``name`` is either a known function or has its own + printing method. Used to check if rewriting is possible.""" + + # since the whole point of function_overrides is to enable proper printing, + # we presume they all are printable + + return name in self.known_functions or name in function_overrides or getattr(self, '_print_{}'.format(name), False) + + def _collect_functions(self, expr): + functions = set() + if isinstance(expr, Expr): + if expr.is_Function: + functions.add(expr.func) + for arg in expr.args: + functions = functions.union(self._collect_functions(arg)) + return functions + + def _rewrite_known_functions(self, expr): + if not isinstance(expr, Expr): + return expr + + expression_functions = self._collect_functions(expr) + rewriteable_functions = { + name: (target_f, required_fs) + for name, (target_f, required_fs) in self._rewriteable_functions.items() + if self._can_print(target_f) + and all(self._can_print(f) for f in required_fs) + } + for func in expression_functions: + target_f, _ = rewriteable_functions.get(func.__name__, (None, None)) + if target_f: + expr = expr.rewrite(target_f) + return expr + + def indent_code(self, code): + """Accepts a string of code or a list of code lines""" + + if isinstance(code, str): + code_lines = self.indent_code(code.splitlines(True)) + return ''.join(code_lines) + + tab = " " + inc_token = ('{', '(', '{\n', '(\n') + dec_token = ('}', ')') + + code = [ line.lstrip(' \t') for line in code ] + + increase = [ int(any(map(line.endswith, inc_token))) for line in code ] + decrease = [ int(any(map(line.startswith, dec_token))) + for line in code ] + + pretty = [] + level = 0 + for n, line in enumerate(code): + if line in ('', '\n'): + pretty.append(line) + continue + level -= decrease[n] + pretty.append("%s%s" % (tab*level, line)) + level += increase[n] + return pretty diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/smtlib.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/smtlib.py new file mode 100644 index 0000000000000000000000000000000000000000..8fa015c6198cb32837eb3a0d7fe9d61352da25ad --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/smtlib.py @@ -0,0 +1,583 @@ +import typing + +import sympy +from sympy.core import Add, Mul +from sympy.core import Symbol, Expr, Float, Rational, Integer, Basic +from sympy.core.function import UndefinedFunction, Function +from sympy.core.relational import Relational, Unequality, Equality, LessThan, GreaterThan, StrictLessThan, StrictGreaterThan +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp, log, Pow +from sympy.functions.elementary.hyperbolic import sinh, cosh, tanh +from sympy.functions.elementary.miscellaneous import Min, Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin, cos, tan, asin, acos, atan, atan2 +from sympy.logic.boolalg import And, Or, Xor, Implies, Boolean +from sympy.logic.boolalg import BooleanTrue, BooleanFalse, BooleanFunction, Not, ITE +from sympy.printing.printer import Printer +from sympy.sets import Interval +from mpmath.libmp.libmpf import prec_to_dps, to_str as mlib_to_str +from sympy.assumptions.assume import AppliedPredicate +from sympy.assumptions.relation.binrel import AppliedBinaryRelation +from sympy.assumptions.ask import Q +from sympy.assumptions.relation.equality import StrictGreaterThanPredicate, StrictLessThanPredicate, GreaterThanPredicate, LessThanPredicate, EqualityPredicate + + +class SMTLibPrinter(Printer): + printmethod = "_smtlib" + + # based on dReal, an automated reasoning tool for solving problems that can be encoded as first-order logic formulas over the real numbers. + # dReal's special strength is in handling problems that involve a wide range of nonlinear real functions. + _default_settings: dict = { + 'precision': None, + 'known_types': { + bool: 'Bool', + int: 'Int', + float: 'Real' + }, + 'known_constants': { + # pi: 'MY_VARIABLE_PI_DECLARED_ELSEWHERE', + }, + 'known_functions': { + Add: '+', + Mul: '*', + + Equality: '=', + LessThan: '<=', + GreaterThan: '>=', + StrictLessThan: '<', + StrictGreaterThan: '>', + + EqualityPredicate(): '=', + LessThanPredicate(): '<=', + GreaterThanPredicate(): '>=', + StrictLessThanPredicate(): '<', + StrictGreaterThanPredicate(): '>', + + exp: 'exp', + log: 'log', + Abs: 'abs', + sin: 'sin', + cos: 'cos', + tan: 'tan', + asin: 'arcsin', + acos: 'arccos', + atan: 'arctan', + atan2: 'arctan2', + sinh: 'sinh', + cosh: 'cosh', + tanh: 'tanh', + Min: 'min', + Max: 'max', + Pow: 'pow', + + And: 'and', + Or: 'or', + Xor: 'xor', + Not: 'not', + ITE: 'ite', + Implies: '=>', + } + } + + symbol_table: dict + + def __init__(self, settings: typing.Optional[dict] = None, + symbol_table=None): + settings = settings or {} + self.symbol_table = symbol_table or {} + Printer.__init__(self, settings) + self._precision = self._settings['precision'] + self._known_types = dict(self._settings['known_types']) + self._known_constants = dict(self._settings['known_constants']) + self._known_functions = dict(self._settings['known_functions']) + + for _ in self._known_types.values(): assert self._is_legal_name(_) + for _ in self._known_constants.values(): assert self._is_legal_name(_) + # for _ in self._known_functions.values(): assert self._is_legal_name(_) # +, *, <, >, etc. + + def _is_legal_name(self, s: str): + if not s: return False + if s[0].isnumeric(): return False + return all(_.isalnum() or _ == '_' for _ in s) + + def _s_expr(self, op: str, args: typing.Union[list, tuple]) -> str: + args_str = ' '.join( + a if isinstance(a, str) + else self._print(a) + for a in args + ) + return f'({op} {args_str})' + + def _print_Function(self, e): + if e in self._known_functions: + op = self._known_functions[e] + elif type(e) in self._known_functions: + op = self._known_functions[type(e)] + elif type(type(e)) == UndefinedFunction: + op = e.name + elif isinstance(e, AppliedBinaryRelation) and e.function in self._known_functions: + op = self._known_functions[e.function] + return self._s_expr(op, e.arguments) + else: + op = self._known_functions[e] # throw KeyError + + return self._s_expr(op, e.args) + + def _print_Relational(self, e: Relational): + return self._print_Function(e) + + def _print_BooleanFunction(self, e: BooleanFunction): + return self._print_Function(e) + + def _print_Expr(self, e: Expr): + return self._print_Function(e) + + def _print_Unequality(self, e: Unequality): + if type(e) in self._known_functions: + return self._print_Relational(e) # default + else: + eq_op = self._known_functions[Equality] + not_op = self._known_functions[Not] + return self._s_expr(not_op, [self._s_expr(eq_op, e.args)]) + + def _print_Piecewise(self, e: Piecewise): + def _print_Piecewise_recursive(args: typing.Union[list, tuple]): + e, c = args[0] + if len(args) == 1: + assert (c is True) or isinstance(c, BooleanTrue) + return self._print(e) + else: + ite = self._known_functions[ITE] + return self._s_expr(ite, [ + c, e, _print_Piecewise_recursive(args[1:]) + ]) + + return _print_Piecewise_recursive(e.args) + + def _print_Interval(self, e: Interval): + if e.start.is_infinite and e.end.is_infinite: + return '' + elif e.start.is_infinite != e.end.is_infinite: + raise ValueError(f'One-sided intervals (`{e}`) are not supported in SMT.') + else: + return f'[{e.start}, {e.end}]' + + def _print_AppliedPredicate(self, e: AppliedPredicate): + if e.function == Q.positive: + rel = Q.gt(e.arguments[0],0) + elif e.function == Q.negative: + rel = Q.lt(e.arguments[0], 0) + elif e.function == Q.zero: + rel = Q.eq(e.arguments[0], 0) + elif e.function == Q.nonpositive: + rel = Q.le(e.arguments[0], 0) + elif e.function == Q.nonnegative: + rel = Q.ge(e.arguments[0], 0) + elif e.function == Q.nonzero: + rel = Q.ne(e.arguments[0], 0) + else: + raise ValueError(f"Predicate (`{e}`) is not handled.") + + return self._print_AppliedBinaryRelation(rel) + + def _print_AppliedBinaryRelation(self, e: AppliedPredicate): + if e.function == Q.ne: + return self._print_Unequality(Unequality(*e.arguments)) + else: + return self._print_Function(e) + + # todo: Sympy does not support quantifiers yet as of 2022, but quantifiers can be handy in SMT. + # For now, users can extend this class and build in their own quantifier support. + # See `test_quantifier_extensions()` in test_smtlib.py for an example of how this might look. + + # def _print_ForAll(self, e: ForAll): + # return self._s('forall', [ + # self._s('', [ + # self._s(sym.name, [self._type_name(sym), Interval(start, end)]) + # for sym, start, end in e.limits + # ]), + # e.function + # ]) + + def _print_BooleanTrue(self, x: BooleanTrue): + return 'true' + + def _print_BooleanFalse(self, x: BooleanFalse): + return 'false' + + def _print_Float(self, x: Float): + dps = prec_to_dps(x._prec) + str_real = mlib_to_str(x._mpf_, dps, strip_zeros=True, min_fixed=None, max_fixed=None) + + if 'e' in str_real: + (mant, exp) = str_real.split('e') + + if exp[0] == '+': + exp = exp[1:] + + mul = self._known_functions[Mul] + pow = self._known_functions[Pow] + + return r"(%s %s (%s 10 %s))" % (mul, mant, pow, exp) + elif str_real in ["+inf", "-inf"]: + raise ValueError("Infinite values are not supported in SMT.") + else: + return str_real + + def _print_float(self, x: float): + return self._print(Float(x)) + + def _print_Rational(self, x: Rational): + return self._s_expr('/', [x.p, x.q]) + + def _print_Integer(self, x: Integer): + assert x.q == 1 + return str(x.p) + + def _print_int(self, x: int): + return str(x) + + def _print_Symbol(self, x: Symbol): + assert self._is_legal_name(x.name) + return x.name + + def _print_NumberSymbol(self, x): + name = self._known_constants.get(x) + if name: + return name + else: + f = x.evalf(self._precision) if self._precision else x.evalf() + return self._print_Float(f) + + def _print_UndefinedFunction(self, x): + assert self._is_legal_name(x.name) + return x.name + + def _print_Exp1(self, x): + return ( + self._print_Function(exp(1, evaluate=False)) + if exp in self._known_functions else + self._print_NumberSymbol(x) + ) + + def emptyPrinter(self, expr): + raise NotImplementedError(f'Cannot convert `{repr(expr)}` of type `{type(expr)}` to SMT.') + + +def smtlib_code( + expr, + auto_assert=True, auto_declare=True, + precision=None, + symbol_table=None, + known_types=None, known_constants=None, known_functions=None, + prefix_expressions=None, suffix_expressions=None, + log_warn=None +): + r"""Converts ``expr`` to a string of smtlib code. + + Parameters + ========== + + expr : Expr | List[Expr] + A SymPy expression or system to be converted. + auto_assert : bool, optional + If false, do not modify expr and produce only the S-Expression equivalent of expr. + If true, assume expr is a system and assert each boolean element. + auto_declare : bool, optional + If false, do not produce declarations for the symbols used in expr. + If true, prepend all necessary declarations for variables used in expr based on symbol_table. + precision : integer, optional + The ``evalf(..)`` precision for numbers such as pi. + symbol_table : dict, optional + A dictionary where keys are ``Symbol`` or ``Function`` instances and values are their Python type i.e. ``bool``, ``int``, ``float``, or ``Callable[...]``. + If incomplete, an attempt will be made to infer types from ``expr``. + known_types: dict, optional + A dictionary where keys are ``bool``, ``int``, ``float`` etc. and values are their corresponding SMT type names. + If not given, a partial listing compatible with several solvers will be used. + known_functions : dict, optional + A dictionary where keys are ``Function``, ``Relational``, ``BooleanFunction``, or ``Expr`` instances and values are their SMT string representations. + If not given, a partial listing optimized for dReal solver (but compatible with others) will be used. + known_constants: dict, optional + A dictionary where keys are ``NumberSymbol`` instances and values are their SMT variable names. + When using this feature, extra caution must be taken to avoid naming collisions between user symbols and listed constants. + If not given, constants will be expanded inline i.e. ``3.14159`` instead of ``MY_SMT_VARIABLE_FOR_PI``. + prefix_expressions: list, optional + A list of lists of ``str`` and/or expressions to convert into SMTLib and prefix to the output. + suffix_expressions: list, optional + A list of lists of ``str`` and/or expressions to convert into SMTLib and postfix to the output. + log_warn: lambda function, optional + A function to record all warnings during potentially risky operations. + Soundness is a core value in SMT solving, so it is good to log all assumptions made. + + Examples + ======== + >>> from sympy import smtlib_code, symbols, sin, Eq + >>> x = symbols('x') + >>> smtlib_code(sin(x).series(x).removeO(), log_warn=print) + Could not infer type of `x`. Defaulting to float. + Non-Boolean expression `x**5/120 - x**3/6 + x` will not be asserted. Converting to SMTLib verbatim. + '(declare-const x Real)\n(+ x (* (/ -1 6) (pow x 3)) (* (/ 1 120) (pow x 5)))' + + >>> from sympy import Rational + >>> x, y, tau = symbols("x, y, tau") + >>> smtlib_code((2*tau)**Rational(7, 2), log_warn=print) + Could not infer type of `tau`. Defaulting to float. + Non-Boolean expression `8*sqrt(2)*tau**(7/2)` will not be asserted. Converting to SMTLib verbatim. + '(declare-const tau Real)\n(* 8 (pow 2 (/ 1 2)) (pow tau (/ 7 2)))' + + ``Piecewise`` expressions are implemented with ``ite`` expressions by default. + Note that if the ``Piecewise`` lacks a default term, represented by + ``(expr, True)`` then an error will be thrown. This is to prevent + generating an expression that may not evaluate to anything. + + >>> from sympy import Piecewise + >>> pw = Piecewise((x + 1, x > 0), (x, True)) + >>> smtlib_code(Eq(pw, 3), symbol_table={x: float}, log_warn=print) + '(declare-const x Real)\n(assert (= (ite (> x 0) (+ 1 x) x) 3))' + + Custom printing can be defined for certain types by passing a dictionary of + PythonType : "SMT Name" to the ``known_types``, ``known_constants``, and ``known_functions`` kwargs. + + >>> from typing import Callable + >>> from sympy import Function, Add + >>> f = Function('f') + >>> g = Function('g') + >>> smt_builtin_funcs = { # functions our SMT solver will understand + ... f: "existing_smtlib_fcn", + ... Add: "sum", + ... } + >>> user_def_funcs = { # functions defined by the user must have their types specified explicitly + ... g: Callable[[int], float], + ... } + >>> smtlib_code(f(x) + g(x), symbol_table=user_def_funcs, known_functions=smt_builtin_funcs, log_warn=print) + Non-Boolean expression `f(x) + g(x)` will not be asserted. Converting to SMTLib verbatim. + '(declare-const x Int)\n(declare-fun g (Int) Real)\n(sum (existing_smtlib_fcn x) (g x))' + """ + log_warn = log_warn or (lambda _: None) + + if not isinstance(expr, list): expr = [expr] + expr = [ + sympy.sympify(_, strict=True, evaluate=False, convert_xor=False) + for _ in expr + ] + + if not symbol_table: symbol_table = {} + symbol_table = _auto_infer_smtlib_types( + *expr, symbol_table=symbol_table + ) + # See [FALLBACK RULES] + # Need SMTLibPrinter to populate known_functions and known_constants first. + + settings = {} + if precision: settings['precision'] = precision + del precision + + if known_types: settings['known_types'] = known_types + del known_types + + if known_functions: settings['known_functions'] = known_functions + del known_functions + + if known_constants: settings['known_constants'] = known_constants + del known_constants + + if not prefix_expressions: prefix_expressions = [] + if not suffix_expressions: suffix_expressions = [] + + p = SMTLibPrinter(settings, symbol_table) + del symbol_table + + # [FALLBACK RULES] + for e in expr: + for sym in e.atoms(Symbol, Function): + if ( + sym.is_Symbol and + sym not in p._known_constants and + sym not in p.symbol_table + ): + log_warn(f"Could not infer type of `{sym}`. Defaulting to float.") + p.symbol_table[sym] = float + if ( + sym.is_Function and + type(sym) not in p._known_functions and + type(sym) not in p.symbol_table and + not sym.is_Piecewise + ): raise TypeError( + f"Unknown type of undefined function `{sym}`. " + f"Must be mapped to ``str`` in known_functions or mapped to ``Callable[..]`` in symbol_table." + ) + + declarations = [] + if auto_declare: + constants = {sym.name: sym for e in expr for sym in e.free_symbols + if sym not in p._known_constants} + functions = {fnc.name: fnc for e in expr for fnc in e.atoms(Function) + if type(fnc) not in p._known_functions and not fnc.is_Piecewise} + declarations = \ + [ + _auto_declare_smtlib(sym, p, log_warn) + for sym in constants.values() + ] + [ + _auto_declare_smtlib(fnc, p, log_warn) + for fnc in functions.values() + ] + declarations = [decl for decl in declarations if decl] + + if auto_assert: + expr = [_auto_assert_smtlib(e, p, log_warn) for e in expr] + + # return SMTLibPrinter().doprint(expr) + return '\n'.join([ + # ';; PREFIX EXPRESSIONS', + *[ + e if isinstance(e, str) else p.doprint(e) + for e in prefix_expressions + ], + + # ';; DECLARATIONS', + *sorted(e for e in declarations), + + # ';; EXPRESSIONS', + *[ + e if isinstance(e, str) else p.doprint(e) + for e in expr + ], + + # ';; SUFFIX EXPRESSIONS', + *[ + e if isinstance(e, str) else p.doprint(e) + for e in suffix_expressions + ], + ]) + + +def _auto_declare_smtlib(sym: typing.Union[Symbol, Function], p: SMTLibPrinter, log_warn: typing.Callable[[str], None]): + if sym.is_Symbol: + type_signature = p.symbol_table[sym] + assert isinstance(type_signature, type) + type_signature = p._known_types[type_signature] + return p._s_expr('declare-const', [sym, type_signature]) + + elif sym.is_Function: + type_signature = p.symbol_table[type(sym)] + assert callable(type_signature) + type_signature = [p._known_types[_] for _ in type_signature.__args__] + assert len(type_signature) > 0 + params_signature = f"({' '.join(type_signature[:-1])})" + return_signature = type_signature[-1] + return p._s_expr('declare-fun', [type(sym), params_signature, return_signature]) + + else: + log_warn(f"Non-Symbol/Function `{sym}` will not be declared.") + return None + + +def _auto_assert_smtlib(e: Expr, p: SMTLibPrinter, log_warn: typing.Callable[[str], None]): + if isinstance(e, Boolean) or ( + e in p.symbol_table and p.symbol_table[e] == bool + ) or ( + e.is_Function and + type(e) in p.symbol_table and + p.symbol_table[type(e)].__args__[-1] == bool + ): + return p._s_expr('assert', [e]) + else: + log_warn(f"Non-Boolean expression `{e}` will not be asserted. Converting to SMTLib verbatim.") + return e + + +def _auto_infer_smtlib_types( + *exprs: Basic, + symbol_table: typing.Optional[dict] = None +) -> dict: + # [TYPE INFERENCE RULES] + # X is alone in an expr => X is bool + # X in BooleanFunction.args => X is bool + # X matches to a bool param of a symbol_table function => X is bool + # X matches to an int param of a symbol_table function => X is int + # X.is_integer => X is int + # X == Y, where X is T => Y is T + + # [FALLBACK RULES] + # see _auto_declare_smtlib(..) + # X is not bool and X is not int and X is Symbol => X is float + # else (e.g. X is Function) => error. must be specified explicitly. + + _symbols = dict(symbol_table) if symbol_table else {} + + def safe_update(syms: set, inf): + for s in syms: + assert s.is_Symbol + if (old_type := _symbols.setdefault(s, inf)) != inf: + raise TypeError(f"Could not infer type of `{s}`. Apparently both `{old_type}` and `{inf}`?") + + # EXPLICIT TYPES + safe_update({ + e + for e in exprs + if e.is_Symbol + }, bool) + + safe_update({ + symbol + for e in exprs + for boolfunc in e.atoms(BooleanFunction) + for symbol in boolfunc.args + if symbol.is_Symbol + }, bool) + + safe_update({ + symbol + for e in exprs + for boolfunc in e.atoms(Function) + if type(boolfunc) in _symbols + for symbol, param in zip(boolfunc.args, _symbols[type(boolfunc)].__args__) + if symbol.is_Symbol and param == bool + }, bool) + + safe_update({ + symbol + for e in exprs + for intfunc in e.atoms(Function) + if type(intfunc) in _symbols + for symbol, param in zip(intfunc.args, _symbols[type(intfunc)].__args__) + if symbol.is_Symbol and param == int + }, int) + + safe_update({ + symbol + for e in exprs + for symbol in e.atoms(Symbol) + if symbol.is_integer + }, int) + + safe_update({ + symbol + for e in exprs + for symbol in e.atoms(Symbol) + if symbol.is_real and not symbol.is_integer + }, float) + + # EQUALITY RELATION RULE + rels_eq = [rel for expr in exprs for rel in expr.atoms(Equality)] + rels = [ + (rel.lhs, rel.rhs) for rel in rels_eq if rel.lhs.is_Symbol + ] + [ + (rel.rhs, rel.lhs) for rel in rels_eq if rel.rhs.is_Symbol + ] + for infer, reltd in rels: + inference = ( + _symbols[infer] if infer in _symbols else + _symbols[reltd] if reltd in _symbols else + + _symbols[type(reltd)].__args__[-1] + if reltd.is_Function and type(reltd) in _symbols else + + bool if reltd.is_Boolean else + int if reltd.is_integer or reltd.is_Integer else + float if reltd.is_real else + None + ) + if inference: safe_update({infer}, inference) + + return _symbols diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/str.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/str.py new file mode 100644 index 0000000000000000000000000000000000000000..9975776fbb73bec9c956fe359387fa8036995795 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/str.py @@ -0,0 +1,1021 @@ +""" +A Printer for generating readable representation of most SymPy classes. +""" + +from __future__ import annotations +from typing import Any + +from sympy.core import S, Rational, Pow, Basic, Mul, Number +from sympy.core.mul import _keep_coeff +from sympy.core.numbers import Integer +from sympy.core.relational import Relational +from sympy.core.sorting import default_sort_key +from sympy.utilities.iterables import sift +from .precedence import precedence, PRECEDENCE +from .printer import Printer, print_function + +from mpmath.libmp import prec_to_dps, to_str as mlib_to_str + + +class StrPrinter(Printer): + printmethod = "_sympystr" + _default_settings: dict[str, Any] = { + "order": None, + "full_prec": "auto", + "sympy_integers": False, + "abbrev": False, + "perm_cyclic": True, + "min": None, + "max": None, + "dps" : None + } + + _relationals: dict[str, str] = {} + + def parenthesize(self, item, level, strict=False): + if (precedence(item) < level) or ((not strict) and precedence(item) <= level): + return "(%s)" % self._print(item) + else: + return self._print(item) + + def stringify(self, args, sep, level=0): + return sep.join([self.parenthesize(item, level) for item in args]) + + def emptyPrinter(self, expr): + if isinstance(expr, str): + return expr + elif isinstance(expr, Basic): + return repr(expr) + else: + return str(expr) + + def _print_Add(self, expr, order=None): + terms = self._as_ordered_terms(expr, order=order) + + prec = precedence(expr) + l = [] + for term in terms: + t = self._print(term) + if t.startswith('-') and not term.is_Add: + sign = "-" + t = t[1:] + else: + sign = "+" + if precedence(term) < prec or term.is_Add: + l.extend([sign, "(%s)" % t]) + else: + l.extend([sign, t]) + sign = l.pop(0) + if sign == '+': + sign = "" + return sign + ' '.join(l) + + def _print_BooleanTrue(self, expr): + return "True" + + def _print_BooleanFalse(self, expr): + return "False" + + def _print_Not(self, expr): + return '~%s' %(self.parenthesize(expr.args[0],PRECEDENCE["Not"])) + + def _print_And(self, expr): + args = list(expr.args) + for j, i in enumerate(args): + if isinstance(i, Relational) and ( + i.canonical.rhs is S.NegativeInfinity): + args.insert(0, args.pop(j)) + return self.stringify(args, " & ", PRECEDENCE["BitwiseAnd"]) + + def _print_Or(self, expr): + return self.stringify(expr.args, " | ", PRECEDENCE["BitwiseOr"]) + + def _print_Xor(self, expr): + return self.stringify(expr.args, " ^ ", PRECEDENCE["BitwiseXor"]) + + def _print_AppliedPredicate(self, expr): + return '%s(%s)' % ( + self._print(expr.function), self.stringify(expr.arguments, ", ")) + + def _print_Basic(self, expr): + l = [self._print(o) for o in expr.args] + return expr.__class__.__name__ + "(%s)" % ", ".join(l) + + def _print_BlockMatrix(self, B): + if B.blocks.shape == (1, 1): + self._print(B.blocks[0, 0]) + return self._print(B.blocks) + + def _print_Catalan(self, expr): + return 'Catalan' + + def _print_ComplexInfinity(self, expr): + return 'zoo' + + def _print_ConditionSet(self, s): + args = tuple([self._print(i) for i in (s.sym, s.condition)]) + if s.base_set is S.UniversalSet: + return 'ConditionSet(%s, %s)' % args + args += (self._print(s.base_set),) + return 'ConditionSet(%s, %s, %s)' % args + + def _print_Derivative(self, expr): + dexpr = expr.expr + dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count] + return 'Derivative(%s)' % ", ".join((self._print(arg) for arg in [dexpr] + dvars)) + + def _print_dict(self, d): + keys = sorted(d.keys(), key=default_sort_key) + items = [] + + for key in keys: + item = "%s: %s" % (self._print(key), self._print(d[key])) + items.append(item) + + return "{%s}" % ", ".join(items) + + def _print_Dict(self, expr): + return self._print_dict(expr) + + def _print_RandomDomain(self, d): + if hasattr(d, 'as_boolean'): + return 'Domain: ' + self._print(d.as_boolean()) + elif hasattr(d, 'set'): + return ('Domain: ' + self._print(d.symbols) + ' in ' + + self._print(d.set)) + else: + return 'Domain on ' + self._print(d.symbols) + + def _print_Dummy(self, expr): + return '_' + expr.name + + def _print_EulerGamma(self, expr): + return 'EulerGamma' + + def _print_Exp1(self, expr): + return 'E' + + def _print_ExprCondPair(self, expr): + return '(%s, %s)' % (self._print(expr.expr), self._print(expr.cond)) + + def _print_Function(self, expr): + return expr.func.__name__ + "(%s)" % self.stringify(expr.args, ", ") + + def _print_GoldenRatio(self, expr): + return 'GoldenRatio' + + def _print_Heaviside(self, expr): + # Same as _print_Function but uses pargs to suppress default 1/2 for + # 2nd args + return expr.func.__name__ + "(%s)" % self.stringify(expr.pargs, ", ") + + def _print_TribonacciConstant(self, expr): + return 'TribonacciConstant' + + def _print_ImaginaryUnit(self, expr): + return 'I' + + def _print_Infinity(self, expr): + return 'oo' + + def _print_Integral(self, expr): + def _xab_tostr(xab): + if len(xab) == 1: + return self._print(xab[0]) + else: + return self._print((xab[0],) + tuple(xab[1:])) + L = ', '.join([_xab_tostr(l) for l in expr.limits]) + return 'Integral(%s, %s)' % (self._print(expr.function), L) + + def _print_Interval(self, i): + fin = 'Interval{m}({a}, {b})' + a, b, l, r = i.args + if a.is_infinite and b.is_infinite: + m = '' + elif a.is_infinite and not r: + m = '' + elif b.is_infinite and not l: + m = '' + elif not l and not r: + m = '' + elif l and r: + m = '.open' + elif l: + m = '.Lopen' + else: + m = '.Ropen' + return fin.format(**{'a': a, 'b': b, 'm': m}) + + def _print_AccumulationBounds(self, i): + return "AccumBounds(%s, %s)" % (self._print(i.min), + self._print(i.max)) + + def _print_Inverse(self, I): + return "%s**(-1)" % self.parenthesize(I.arg, PRECEDENCE["Pow"]) + + def _print_Lambda(self, obj): + expr = obj.expr + sig = obj.signature + if len(sig) == 1 and sig[0].is_symbol: + sig = sig[0] + return "Lambda(%s, %s)" % (self._print(sig), self._print(expr)) + + def _print_LatticeOp(self, expr): + args = sorted(expr.args, key=default_sort_key) + return expr.func.__name__ + "(%s)" % ", ".join(self._print(arg) for arg in args) + + def _print_Limit(self, expr): + e, z, z0, dir = expr.args + return "Limit(%s, %s, %s, dir='%s')" % tuple(map(self._print, (e, z, z0, dir))) + + + def _print_list(self, expr): + return "[%s]" % self.stringify(expr, ", ") + + def _print_List(self, expr): + return self._print_list(expr) + + def _print_MatrixBase(self, expr): + return expr._format_str(self) + + def _print_MatrixElement(self, expr): + return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \ + + '[%s, %s]' % (self._print(expr.i), self._print(expr.j)) + + def _print_MatrixSlice(self, expr): + def strslice(x, dim): + x = list(x) + if x[2] == 1: + del x[2] + if x[0] == 0: + x[0] = '' + if x[1] == dim: + x[1] = '' + return ':'.join((self._print(arg) for arg in x)) + return (self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) + '[' + + strslice(expr.rowslice, expr.parent.rows) + ', ' + + strslice(expr.colslice, expr.parent.cols) + ']') + + def _print_DeferredVector(self, expr): + return expr.name + + def _print_Mul(self, expr): + + prec = precedence(expr) + + # Check for unevaluated Mul. In this case we need to make sure the + # identities are visible, multiple Rational factors are not combined + # etc so we display in a straight-forward form that fully preserves all + # args and their order. + args = expr.args + if args[0] is S.One or any( + isinstance(a, Number) or + a.is_Pow and all(ai.is_Integer for ai in a.args) + for a in args[1:]): + d, n = sift(args, lambda x: + isinstance(x, Pow) and bool(x.exp.as_coeff_Mul()[0] < 0), + binary=True) + for i, di in enumerate(d): + if di.exp.is_Number: + e = -di.exp + else: + dargs = list(di.exp.args) + dargs[0] = -dargs[0] + e = Mul._from_args(dargs) + d[i] = Pow(di.base, e, evaluate=False) if e - 1 else di.base + + pre = [] + # don't parenthesize first factor if negative + if n and not n[0].is_Add and n[0].could_extract_minus_sign(): + pre = [self._print(n.pop(0))] + + nfactors = pre + [self.parenthesize(a, prec, strict=False) + for a in n] + if not nfactors: + nfactors = ['1'] + + # don't parenthesize first of denominator unless singleton + if len(d) > 1 and d[0].could_extract_minus_sign(): + pre = [self._print(d.pop(0))] + else: + pre = [] + dfactors = pre + [self.parenthesize(a, prec, strict=False) + for a in d] + + n = '*'.join(nfactors) + d = '*'.join(dfactors) + if len(dfactors) > 1: + return '%s/(%s)' % (n, d) + elif dfactors: + return '%s/%s' % (n, d) + return n + + c, e = expr.as_coeff_Mul() + if c < 0: + expr = _keep_coeff(-c, e) + sign = "-" + else: + sign = "" + + a = [] # items in the numerator + b = [] # items that are in the denominator (if any) + + pow_paren = [] # Will collect all pow with more than one base element and exp = -1 + + if self.order not in ('old', 'none'): + args = expr.as_ordered_factors() + else: + # use make_args in case expr was something like -x -> x + args = Mul.make_args(expr) + + # Gather args for numerator/denominator + def apow(i): + b, e = i.as_base_exp() + eargs = list(Mul.make_args(e)) + if eargs[0] is S.NegativeOne: + eargs = eargs[1:] + else: + eargs[0] = -eargs[0] + e = Mul._from_args(eargs) + if isinstance(i, Pow): + return i.func(b, e, evaluate=False) + return i.func(e, evaluate=False) + for item in args: + if (item.is_commutative and + isinstance(item, Pow) and + bool(item.exp.as_coeff_Mul()[0] < 0)): + if item.exp is not S.NegativeOne: + b.append(apow(item)) + else: + if (len(item.args[0].args) != 1 and + isinstance(item.base, (Mul, Pow))): + # To avoid situations like #14160 + pow_paren.append(item) + b.append(item.base) + elif item.is_Rational and item is not S.Infinity: + if item.p != 1: + a.append(Rational(item.p)) + if item.q != 1: + b.append(Rational(item.q)) + else: + a.append(item) + + a = a or [S.One] + + a_str = [self.parenthesize(x, prec, strict=False) for x in a] + b_str = [self.parenthesize(x, prec, strict=False) for x in b] + + # To parenthesize Pow with exp = -1 and having more than one Symbol + for item in pow_paren: + if item.base in b: + b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)] + + if not b: + return sign + '*'.join(a_str) + elif len(b) == 1: + return sign + '*'.join(a_str) + "/" + b_str[0] + else: + return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str) + + def _print_MatMul(self, expr): + c, m = expr.as_coeff_mmul() + + sign = "" + if c.is_number: + re, im = c.as_real_imag() + if im.is_zero and re.is_negative: + expr = _keep_coeff(-c, m) + sign = "-" + elif re.is_zero and im.is_negative: + expr = _keep_coeff(-c, m) + sign = "-" + + return sign + '*'.join( + [self.parenthesize(arg, precedence(expr)) for arg in expr.args] + ) + + def _print_ElementwiseApplyFunction(self, expr): + return "{}.({})".format( + expr.function, + self._print(expr.expr), + ) + + def _print_NaN(self, expr): + return 'nan' + + def _print_NegativeInfinity(self, expr): + return '-oo' + + def _print_Order(self, expr): + if not expr.variables or all(p is S.Zero for p in expr.point): + if len(expr.variables) <= 1: + return 'O(%s)' % self._print(expr.expr) + else: + return 'O(%s)' % self.stringify((expr.expr,) + expr.variables, ', ', 0) + else: + return 'O(%s)' % self.stringify(expr.args, ', ', 0) + + def _print_Ordinal(self, expr): + return expr.__str__() + + def _print_Cycle(self, expr): + return expr.__str__() + + def _print_Permutation(self, expr): + from sympy.combinatorics.permutations import Permutation, Cycle + from sympy.utilities.exceptions import sympy_deprecation_warning + + perm_cyclic = Permutation.print_cyclic + if perm_cyclic is not None: + sympy_deprecation_warning( + f""" + Setting Permutation.print_cyclic is deprecated. Instead use + init_printing(perm_cyclic={perm_cyclic}). + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-permutation-print_cyclic", + stacklevel=7, + ) + else: + perm_cyclic = self._settings.get("perm_cyclic", True) + + if perm_cyclic: + if not expr.size: + return '()' + # before taking Cycle notation, see if the last element is + # a singleton and move it to the head of the string + s = Cycle(expr)(expr.size - 1).__repr__()[len('Cycle'):] + last = s.rfind('(') + if not last == 0 and ',' not in s[last:]: + s = s[last:] + s[:last] + s = s.replace(',', '') + return s + else: + s = expr.support() + if not s: + if expr.size < 5: + return 'Permutation(%s)' % self._print(expr.array_form) + return 'Permutation([], size=%s)' % self._print(expr.size) + trim = self._print(expr.array_form[:s[-1] + 1]) + ', size=%s' % self._print(expr.size) + use = full = self._print(expr.array_form) + if len(trim) < len(full): + use = trim + return 'Permutation(%s)' % use + + def _print_Subs(self, obj): + expr, old, new = obj.args + if len(obj.point) == 1: + old = old[0] + new = new[0] + return "Subs(%s, %s, %s)" % ( + self._print(expr), self._print(old), self._print(new)) + + def _print_TensorIndex(self, expr): + return expr._print() + + def _print_TensorHead(self, expr): + return expr._print() + + def _print_Tensor(self, expr): + return expr._print() + + def _print_TensMul(self, expr): + # prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)" + sign, args = expr._get_args_for_traditional_printer() + return sign + "*".join( + [self.parenthesize(arg, precedence(expr)) for arg in args] + ) + + def _print_TensAdd(self, expr): + return expr._print() + + def _print_ArraySymbol(self, expr): + return self._print(expr.name) + + def _print_ArrayElement(self, expr): + return "%s[%s]" % ( + self.parenthesize(expr.name, PRECEDENCE["Func"], True), ", ".join([self._print(i) for i in expr.indices])) + + def _print_PermutationGroup(self, expr): + p = [' %s' % self._print(a) for a in expr.args] + return 'PermutationGroup([\n%s])' % ',\n'.join(p) + + def _print_Pi(self, expr): + return 'pi' + + def _print_PolyRing(self, ring): + return "Polynomial ring in %s over %s with %s order" % \ + (", ".join((self._print(rs) for rs in ring.symbols)), + self._print(ring.domain), self._print(ring.order)) + + def _print_FracField(self, field): + return "Rational function field in %s over %s with %s order" % \ + (", ".join((self._print(fs) for fs in field.symbols)), + self._print(field.domain), self._print(field.order)) + + def _print_FreeGroupElement(self, elm): + return elm.__str__() + + def _print_GaussianElement(self, poly): + return "(%s + %s*I)" % (poly.x, poly.y) + + def _print_PolyElement(self, poly): + return poly.str(self, PRECEDENCE, "%s**%s", "*") + + def _print_FracElement(self, frac): + if frac.denom == 1: + return self._print(frac.numer) + else: + numer = self.parenthesize(frac.numer, PRECEDENCE["Mul"], strict=True) + denom = self.parenthesize(frac.denom, PRECEDENCE["Atom"], strict=True) + return numer + "/" + denom + + def _print_Poly(self, expr): + ATOM_PREC = PRECEDENCE["Atom"] - 1 + terms, gens = [], [ self.parenthesize(s, ATOM_PREC) for s in expr.gens ] + + for monom, coeff in expr.terms(): + s_monom = [] + + for i, e in enumerate(monom): + if e > 0: + if e == 1: + s_monom.append(gens[i]) + else: + s_monom.append(gens[i] + "**%d" % e) + + s_monom = "*".join(s_monom) + + if coeff.is_Add: + if s_monom: + s_coeff = "(" + self._print(coeff) + ")" + else: + s_coeff = self._print(coeff) + else: + if s_monom: + if coeff is S.One: + terms.extend(['+', s_monom]) + continue + + if coeff is S.NegativeOne: + terms.extend(['-', s_monom]) + continue + + s_coeff = self._print(coeff) + + if not s_monom: + s_term = s_coeff + else: + s_term = s_coeff + "*" + s_monom + + if s_term.startswith('-'): + terms.extend(['-', s_term[1:]]) + else: + terms.extend(['+', s_term]) + + if terms[0] in ('-', '+'): + modifier = terms.pop(0) + + if modifier == '-': + terms[0] = '-' + terms[0] + + format = expr.__class__.__name__ + "(%s, %s" + + from sympy.polys.polyerrors import PolynomialError + + try: + format += ", modulus=%s" % expr.get_modulus() + except PolynomialError: + format += ", domain='%s'" % expr.get_domain() + + format += ")" + + for index, item in enumerate(gens): + if len(item) > 2 and (item[:1] == "(" and item[len(item) - 1:] == ")"): + gens[index] = item[1:len(item) - 1] + + return format % (' '.join(terms), ', '.join(gens)) + + def _print_UniversalSet(self, p): + return 'UniversalSet' + + def _print_AlgebraicNumber(self, expr): + if expr.is_aliased: + return self._print(expr.as_poly().as_expr()) + else: + return self._print(expr.as_expr()) + + def _print_Pow(self, expr, rational=False): + """Printing helper function for ``Pow`` + + Parameters + ========== + + rational : bool, optional + If ``True``, it will not attempt printing ``sqrt(x)`` or + ``x**S.Half`` as ``sqrt``, and will use ``x**(1/2)`` + instead. + + See examples for additional details + + Examples + ======== + + >>> from sympy import sqrt, StrPrinter + >>> from sympy.abc import x + + How ``rational`` keyword works with ``sqrt``: + + >>> printer = StrPrinter() + >>> printer._print_Pow(sqrt(x), rational=True) + 'x**(1/2)' + >>> printer._print_Pow(sqrt(x), rational=False) + 'sqrt(x)' + >>> printer._print_Pow(1/sqrt(x), rational=True) + 'x**(-1/2)' + >>> printer._print_Pow(1/sqrt(x), rational=False) + '1/sqrt(x)' + + Notes + ===== + + ``sqrt(x)`` is canonicalized as ``Pow(x, S.Half)`` in SymPy, + so there is no need of defining a separate printer for ``sqrt``. + Instead, it should be handled here as well. + """ + PREC = precedence(expr) + + if expr.exp is S.Half and not rational: + return "sqrt(%s)" % self._print(expr.base) + + if expr.is_commutative: + if -expr.exp is S.Half and not rational: + # Note: Don't test "expr.exp == -S.Half" here, because that will + # match -0.5, which we don't want. + return "%s/sqrt(%s)" % tuple((self._print(arg) for arg in (S.One, expr.base))) + if expr.exp is -S.One: + # Similarly to the S.Half case, don't test with "==" here. + return '%s/%s' % (self._print(S.One), + self.parenthesize(expr.base, PREC, strict=False)) + + e = self.parenthesize(expr.exp, PREC, strict=False) + if self.printmethod == '_sympyrepr' and expr.exp.is_Rational and expr.exp.q != 1: + # the parenthesized exp should be '(Rational(a, b))' so strip parens, + # but just check to be sure. + if e.startswith('(Rational'): + return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e[1:-1]) + return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e) + + def _print_UnevaluatedExpr(self, expr): + return self._print(expr.args[0]) + + def _print_MatPow(self, expr): + PREC = precedence(expr) + return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), + self.parenthesize(expr.exp, PREC, strict=False)) + + def _print_Integer(self, expr): + if self._settings.get("sympy_integers", False): + return "S(%s)" % (expr) + return str(expr.p) + + def _print_Integers(self, expr): + return 'Integers' + + def _print_Naturals(self, expr): + return 'Naturals' + + def _print_Naturals0(self, expr): + return 'Naturals0' + + def _print_Rationals(self, expr): + return 'Rationals' + + def _print_Reals(self, expr): + return 'Reals' + + def _print_Complexes(self, expr): + return 'Complexes' + + def _print_EmptySet(self, expr): + return 'EmptySet' + + def _print_EmptySequence(self, expr): + return 'EmptySequence' + + def _print_int(self, expr): + return str(expr) + + def _print_mpz(self, expr): + return str(expr) + + def _print_Rational(self, expr): + if expr.q == 1: + return str(expr.p) + else: + if self._settings.get("sympy_integers", False): + return "S(%s)/%s" % (expr.p, expr.q) + return "%s/%s" % (expr.p, expr.q) + + def _print_PythonRational(self, expr): + if expr.q == 1: + return str(expr.p) + else: + return "%d/%d" % (expr.p, expr.q) + + def _print_Fraction(self, expr): + if expr.denominator == 1: + return str(expr.numerator) + else: + return "%s/%s" % (expr.numerator, expr.denominator) + + def _print_mpq(self, expr): + if expr.denominator == 1: + return str(expr.numerator) + else: + return "%s/%s" % (expr.numerator, expr.denominator) + + def _print_Float(self, expr): + prec = expr._prec + dps = self._settings.get('dps', None) + if dps is None: + dps = 0 if prec < 5 else prec_to_dps(expr._prec) + if self._settings["full_prec"] is True: + strip = False + elif self._settings["full_prec"] is False: + strip = True + elif self._settings["full_prec"] == "auto": + strip = self._print_level > 1 + low = self._settings["min"] if "min" in self._settings else None + high = self._settings["max"] if "max" in self._settings else None + rv = mlib_to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high) + if rv.startswith('-.0'): + rv = '-0.' + rv[3:] + elif rv.startswith('.0'): + rv = '0.' + rv[2:] + rv = rv.removeprefix('+') # e.g., +inf -> inf + return rv + + def _print_Relational(self, expr): + + charmap = { + "==": "Eq", + "!=": "Ne", + ":=": "Assignment", + '+=': "AddAugmentedAssignment", + "-=": "SubAugmentedAssignment", + "*=": "MulAugmentedAssignment", + "/=": "DivAugmentedAssignment", + "%=": "ModAugmentedAssignment", + } + + if expr.rel_op in charmap: + return '%s(%s, %s)' % (charmap[expr.rel_op], self._print(expr.lhs), + self._print(expr.rhs)) + + return '%s %s %s' % (self.parenthesize(expr.lhs, precedence(expr)), + self._relationals.get(expr.rel_op) or expr.rel_op, + self.parenthesize(expr.rhs, precedence(expr))) + + def _print_ComplexRootOf(self, expr): + return "CRootOf(%s, %d)" % (self._print_Add(expr.expr, order='lex'), + expr.index) + + def _print_RootSum(self, expr): + args = [self._print_Add(expr.expr, order='lex')] + + if expr.fun is not S.IdentityFunction: + args.append(self._print(expr.fun)) + + return "RootSum(%s)" % ", ".join(args) + + def _print_GroebnerBasis(self, basis): + cls = basis.__class__.__name__ + + exprs = [self._print_Add(arg, order=basis.order) for arg in basis.exprs] + exprs = "[%s]" % ", ".join(exprs) + + gens = [ self._print(gen) for gen in basis.gens ] + domain = "domain='%s'" % self._print(basis.domain) + order = "order='%s'" % self._print(basis.order) + + args = [exprs] + gens + [domain, order] + + return "%s(%s)" % (cls, ", ".join(args)) + + def _print_set(self, s): + items = sorted(s, key=default_sort_key) + + args = ', '.join(self._print(item) for item in items) + if not args: + return "set()" + return '{%s}' % args + + def _print_FiniteSet(self, s): + from sympy.sets.sets import FiniteSet + items = sorted(s, key=default_sort_key) + + args = ', '.join(self._print(item) for item in items) + if any(item.has(FiniteSet) for item in items): + return 'FiniteSet({})'.format(args) + return '{{{}}}'.format(args) + + def _print_Partition(self, s): + items = sorted(s, key=default_sort_key) + + args = ', '.join(self._print(arg) for arg in items) + return 'Partition({})'.format(args) + + def _print_frozenset(self, s): + if not s: + return "frozenset()" + return "frozenset(%s)" % self._print_set(s) + + def _print_Sum(self, expr): + def _xab_tostr(xab): + if len(xab) == 1: + return self._print(xab[0]) + else: + return self._print((xab[0],) + tuple(xab[1:])) + L = ', '.join([_xab_tostr(l) for l in expr.limits]) + return 'Sum(%s, %s)' % (self._print(expr.function), L) + + def _print_Symbol(self, expr): + return expr.name + _print_MatrixSymbol = _print_Symbol + _print_RandomSymbol = _print_Symbol + + def _print_Identity(self, expr): + return "I" + + def _print_ZeroMatrix(self, expr): + return "0" + + def _print_OneMatrix(self, expr): + return "1" + + def _print_Predicate(self, expr): + return "Q.%s" % expr.name + + def _print_str(self, expr): + return str(expr) + + def _print_tuple(self, expr): + if len(expr) == 1: + return "(%s,)" % self._print(expr[0]) + else: + return "(%s)" % self.stringify(expr, ", ") + + def _print_Tuple(self, expr): + return self._print_tuple(expr) + + def _print_Transpose(self, T): + return "%s.T" % self.parenthesize(T.arg, PRECEDENCE["Pow"]) + + def _print_Uniform(self, expr): + return "Uniform(%s, %s)" % (self._print(expr.a), self._print(expr.b)) + + def _print_Quantity(self, expr): + if self._settings.get("abbrev", False): + return "%s" % expr.abbrev + return "%s" % expr.name + + def _print_Quaternion(self, expr): + s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) for i in expr.args] + a = [s[0]] + [i+"*"+j for i, j in zip(s[1:], "ijk")] + return " + ".join(a) + + def _print_Dimension(self, expr): + return str(expr) + + def _print_Wild(self, expr): + return expr.name + '_' + + def _print_WildFunction(self, expr): + return expr.name + '_' + + def _print_WildDot(self, expr): + return expr.name + + def _print_WildPlus(self, expr): + return expr.name + + def _print_WildStar(self, expr): + return expr.name + + def _print_Zero(self, expr): + if self._settings.get("sympy_integers", False): + return "S(0)" + return self._print_Integer(Integer(0)) + + def _print_DMP(self, p): + cls = p.__class__.__name__ + rep = self._print(p.to_list()) + dom = self._print(p.dom) + + return "%s(%s, %s)" % (cls, rep, dom) + + def _print_DMF(self, expr): + cls = expr.__class__.__name__ + num = self._print(expr.num) + den = self._print(expr.den) + dom = self._print(expr.dom) + + return "%s(%s, %s, %s)" % (cls, num, den, dom) + + def _print_Object(self, obj): + return 'Object("%s")' % obj.name + + def _print_IdentityMorphism(self, morphism): + return 'IdentityMorphism(%s)' % morphism.domain + + def _print_NamedMorphism(self, morphism): + return 'NamedMorphism(%s, %s, "%s")' % \ + (morphism.domain, morphism.codomain, morphism.name) + + def _print_Category(self, category): + return 'Category("%s")' % category.name + + def _print_Manifold(self, manifold): + return manifold.name.name + + def _print_Patch(self, patch): + return patch.name.name + + def _print_CoordSystem(self, coords): + return coords.name.name + + def _print_BaseScalarField(self, field): + return field._coord_sys.symbols[field._index].name + + def _print_BaseVectorField(self, field): + return 'e_%s' % field._coord_sys.symbols[field._index].name + + def _print_Differential(self, diff): + field = diff._form_field + if hasattr(field, '_coord_sys'): + return 'd%s' % field._coord_sys.symbols[field._index].name + else: + return 'd(%s)' % self._print(field) + + def _print_Tr(self, expr): + #TODO : Handle indices + return "%s(%s)" % ("Tr", self._print(expr.args[0])) + + def _print_Str(self, s): + return self._print(s.name) + + def _print_AppliedBinaryRelation(self, expr): + rel = expr.function + return '%s(%s, %s)' % (self._print(rel), + self._print(expr.lhs), + self._print(expr.rhs)) + + +@print_function(StrPrinter) +def sstr(expr, **settings): + """Returns the expression as a string. + + For large expressions where speed is a concern, use the setting + order='none'. If abbrev=True setting is used then units are printed in + abbreviated form. + + Examples + ======== + + >>> from sympy import symbols, Eq, sstr + >>> a, b = symbols('a b') + >>> sstr(Eq(a + b, 0)) + 'Eq(a + b, 0)' + """ + + p = StrPrinter(settings) + s = p.doprint(expr) + + return s + + +class StrReprPrinter(StrPrinter): + """(internal) -- see sstrrepr""" + + def _print_str(self, s): + return repr(s) + + def _print_Str(self, s): + # Str does not to be printed same as str here + return "%s(%s)" % (s.__class__.__name__, self._print(s.name)) + +@print_function(StrReprPrinter) +def sstrrepr(expr, **settings): + """return expr in mixed str/repr form + + i.e. strings are returned in repr form with quotes, and everything else + is returned in str form. + + This function could be useful for hooking into sys.displayhook + """ + + p = StrReprPrinter(settings) + s = p.doprint(expr) + + return s diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tableform.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tableform.py new file mode 100644 index 0000000000000000000000000000000000000000..4a84ef96ae92517a6ec01ca9db1a13e9afa67093 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tableform.py @@ -0,0 +1,366 @@ +from sympy.core.containers import Tuple +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import SympifyError + +from types import FunctionType + + +class TableForm: + r""" + Create a nice table representation of data. + + Examples + ======== + + >>> from sympy import TableForm + >>> t = TableForm([[5, 7], [4, 2], [10, 3]]) + >>> print(t) + 5 7 + 4 2 + 10 3 + + You can use the SymPy's printing system to produce tables in any + format (ascii, latex, html, ...). + + >>> print(t.as_latex()) + \begin{tabular}{l l} + $5$ & $7$ \\ + $4$ & $2$ \\ + $10$ & $3$ \\ + \end{tabular} + + """ + + def __init__(self, data, **kwarg): + """ + Creates a TableForm. + + Parameters: + + data ... + 2D data to be put into the table; data can be + given as a Matrix + + headings ... + gives the labels for rows and columns: + + Can be a single argument that applies to both + dimensions: + + - None ... no labels + - "automatic" ... labels are 1, 2, 3, ... + + Can be a list of labels for rows and columns: + The labels for each dimension can be given + as None, "automatic", or [l1, l2, ...] e.g. + ["automatic", None] will number the rows + + [default: None] + + alignments ... + alignment of the columns with: + + - "left" or "<" + - "center" or "^" + - "right" or ">" + + When given as a single value, the value is used for + all columns. The row headings (if given) will be + right justified unless an explicit alignment is + given for it and all other columns. + + [default: "left"] + + formats ... + a list of format strings or functions that accept + 3 arguments (entry, row number, col number) and + return a string for the table entry. (If a function + returns None then the _print method will be used.) + + wipe_zeros ... + Do not show zeros in the table. + + [default: True] + + pad ... + the string to use to indicate a missing value (e.g. + elements that are None or those that are missing + from the end of a row (i.e. any row that is shorter + than the rest is assumed to have missing values). + When None, nothing will be shown for values that + are missing from the end of a row; values that are + None, however, will be shown. + + [default: None] + + Examples + ======== + + >>> from sympy import TableForm, Symbol + >>> TableForm([[5, 7], [4, 2], [10, 3]]) + 5 7 + 4 2 + 10 3 + >>> TableForm([list('.'*i) for i in range(1, 4)], headings='automatic') + | 1 2 3 + --------- + 1 | . + 2 | . . + 3 | . . . + >>> TableForm([[Symbol('.'*(j if not i%2 else 1)) for i in range(3)] + ... for j in range(4)], alignments='rcl') + . + . . . + .. . .. + ... . ... + """ + from sympy.matrices.dense import Matrix + + # We only support 2D data. Check the consistency: + if isinstance(data, Matrix): + data = data.tolist() + _h = len(data) + + # fill out any short lines + pad = kwarg.get('pad', None) + ok_None = False + if pad is None: + pad = " " + ok_None = True + pad = Symbol(pad) + _w = max(len(line) for line in data) + for i, line in enumerate(data): + if len(line) != _w: + line.extend([pad]*(_w - len(line))) + for j, lj in enumerate(line): + if lj is None: + if not ok_None: + lj = pad + else: + try: + lj = S(lj) + except SympifyError: + lj = Symbol(str(lj)) + line[j] = lj + data[i] = line + _lines = Tuple(*[Tuple(*d) for d in data]) + + headings = kwarg.get("headings", [None, None]) + if headings == "automatic": + _headings = [range(1, _h + 1), range(1, _w + 1)] + else: + h1, h2 = headings + if h1 == "automatic": + h1 = range(1, _h + 1) + if h2 == "automatic": + h2 = range(1, _w + 1) + _headings = [h1, h2] + + allow = ('l', 'r', 'c') + alignments = kwarg.get("alignments", "l") + + def _std_align(a): + a = a.strip().lower() + if len(a) > 1: + return {'left': 'l', 'right': 'r', 'center': 'c'}.get(a, a) + else: + return {'<': 'l', '>': 'r', '^': 'c'}.get(a, a) + std_align = _std_align(alignments) + if std_align in allow: + _alignments = [std_align]*_w + else: + _alignments = [] + for a in alignments: + std_align = _std_align(a) + _alignments.append(std_align) + if std_align not in ('l', 'r', 'c'): + raise ValueError('alignment "%s" unrecognized' % + alignments) + if _headings[0] and len(_alignments) == _w + 1: + _head_align = _alignments[0] + _alignments = _alignments[1:] + else: + _head_align = 'r' + if len(_alignments) != _w: + raise ValueError( + 'wrong number of alignments: expected %s but got %s' % + (_w, len(_alignments))) + + _column_formats = kwarg.get("formats", [None]*_w) + + _wipe_zeros = kwarg.get("wipe_zeros", True) + + self._w = _w + self._h = _h + self._lines = _lines + self._headings = _headings + self._head_align = _head_align + self._alignments = _alignments + self._column_formats = _column_formats + self._wipe_zeros = _wipe_zeros + + def __repr__(self): + from .str import sstr + return sstr(self, order=None) + + def __str__(self): + from .str import sstr + return sstr(self, order=None) + + def as_matrix(self): + """Returns the data of the table in Matrix form. + + Examples + ======== + + >>> from sympy import TableForm + >>> t = TableForm([[5, 7], [4, 2], [10, 3]], headings='automatic') + >>> t + | 1 2 + -------- + 1 | 5 7 + 2 | 4 2 + 3 | 10 3 + >>> t.as_matrix() + Matrix([ + [ 5, 7], + [ 4, 2], + [10, 3]]) + """ + from sympy.matrices.dense import Matrix + return Matrix(self._lines) + + def as_str(self): + # XXX obsolete ? + return str(self) + + def as_latex(self): + from .latex import latex + return latex(self) + + def _sympystr(self, p): + """ + Returns the string representation of 'self'. + + Examples + ======== + + >>> from sympy import TableForm + >>> t = TableForm([[5, 7], [4, 2], [10, 3]]) + >>> s = t.as_str() + + """ + column_widths = [0] * self._w + lines = [] + for line in self._lines: + new_line = [] + for i in range(self._w): + # Format the item somehow if needed: + s = str(line[i]) + if self._wipe_zeros and (s == "0"): + s = " " + w = len(s) + if w > column_widths[i]: + column_widths[i] = w + new_line.append(s) + lines.append(new_line) + + # Check heading: + if self._headings[0]: + self._headings[0] = [str(x) for x in self._headings[0]] + _head_width = max(len(x) for x in self._headings[0]) + + if self._headings[1]: + new_line = [] + for i in range(self._w): + # Format the item somehow if needed: + s = str(self._headings[1][i]) + w = len(s) + if w > column_widths[i]: + column_widths[i] = w + new_line.append(s) + self._headings[1] = new_line + + format_str = [] + + def _align(align, w): + return '%%%s%ss' % ( + ("-" if align == "l" else ""), + str(w)) + format_str = [_align(align, w) for align, w in + zip(self._alignments, column_widths)] + if self._headings[0]: + format_str.insert(0, _align(self._head_align, _head_width)) + format_str.insert(1, '|') + format_str = ' '.join(format_str) + '\n' + + s = [] + if self._headings[1]: + d = self._headings[1] + if self._headings[0]: + d = [""] + d + first_line = format_str % tuple(d) + s.append(first_line) + s.append("-" * (len(first_line) - 1) + "\n") + for i, line in enumerate(lines): + d = [l if self._alignments[j] != 'c' else + l.center(column_widths[j]) for j, l in enumerate(line)] + if self._headings[0]: + l = self._headings[0][i] + l = (l if self._head_align != 'c' else + l.center(_head_width)) + d = [l] + d + s.append(format_str % tuple(d)) + return ''.join(s)[:-1] # don't include trailing newline + + def _latex(self, printer): + """ + Returns the string representation of 'self'. + """ + # Check heading: + if self._headings[1]: + new_line = [] + for i in range(self._w): + # Format the item somehow if needed: + new_line.append(str(self._headings[1][i])) + self._headings[1] = new_line + + alignments = [] + if self._headings[0]: + self._headings[0] = [str(x) for x in self._headings[0]] + alignments = [self._head_align] + alignments.extend(self._alignments) + + s = r"\begin{tabular}{" + " ".join(alignments) + "}\n" + + if self._headings[1]: + d = self._headings[1] + if self._headings[0]: + d = [""] + d + first_line = " & ".join(d) + r" \\" + "\n" + s += first_line + s += r"\hline" + "\n" + for i, line in enumerate(self._lines): + d = [] + for j, x in enumerate(line): + if self._wipe_zeros and (x in (0, "0")): + d.append(" ") + continue + f = self._column_formats[j] + if f: + if isinstance(f, FunctionType): + v = f(x, i, j) + if v is None: + v = printer._print(x) + else: + v = f % x + d.append(v) + else: + v = printer._print(x) + d.append("$%s$" % v) + if self._headings[0]: + d = [self._headings[0][i]] + d + s += " & ".join(d) + r" \\" + "\n" + s += r"\end{tabular}" + return s diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tensorflow.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tensorflow.py new file mode 100644 index 0000000000000000000000000000000000000000..78b0df62b611f336468769e4cee1695bc068eee9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tensorflow.py @@ -0,0 +1,224 @@ +import sympy.codegen +import sympy.codegen.cfunctions +from sympy.external.importtools import version_tuple +from collections.abc import Iterable + +from sympy.core.mul import Mul +from sympy.core.singleton import S +from sympy.codegen.cfunctions import Sqrt +from sympy.external import import_module +from sympy.printing.precedence import PRECEDENCE +from sympy.printing.pycode import AbstractPythonCodePrinter, ArrayPrinter +import sympy + +tensorflow = import_module('tensorflow') + +class TensorflowPrinter(ArrayPrinter, AbstractPythonCodePrinter): + """ + Tensorflow printer which handles vectorized piecewise functions, + logical operators, max/min, and relational operators. + """ + printmethod = "_tensorflowcode" + + mapping = { + sympy.Abs: "tensorflow.math.abs", + sympy.sign: "tensorflow.math.sign", + + # XXX May raise error for ints. + sympy.ceiling: "tensorflow.math.ceil", + sympy.floor: "tensorflow.math.floor", + sympy.log: "tensorflow.math.log", + sympy.exp: "tensorflow.math.exp", + Sqrt: "tensorflow.math.sqrt", + sympy.cos: "tensorflow.math.cos", + sympy.acos: "tensorflow.math.acos", + sympy.sin: "tensorflow.math.sin", + sympy.asin: "tensorflow.math.asin", + sympy.tan: "tensorflow.math.tan", + sympy.atan: "tensorflow.math.atan", + sympy.atan2: "tensorflow.math.atan2", + # XXX Also may give NaN for complex results. + sympy.cosh: "tensorflow.math.cosh", + sympy.acosh: "tensorflow.math.acosh", + sympy.sinh: "tensorflow.math.sinh", + sympy.asinh: "tensorflow.math.asinh", + sympy.tanh: "tensorflow.math.tanh", + sympy.atanh: "tensorflow.math.atanh", + + sympy.re: "tensorflow.math.real", + sympy.im: "tensorflow.math.imag", + sympy.arg: "tensorflow.math.angle", + + # XXX May raise error for ints and complexes + sympy.erf: "tensorflow.math.erf", + sympy.loggamma: "tensorflow.math.lgamma", + + sympy.Eq: "tensorflow.math.equal", + sympy.Ne: "tensorflow.math.not_equal", + sympy.StrictGreaterThan: "tensorflow.math.greater", + sympy.StrictLessThan: "tensorflow.math.less", + sympy.LessThan: "tensorflow.math.less_equal", + sympy.GreaterThan: "tensorflow.math.greater_equal", + + sympy.And: "tensorflow.math.logical_and", + sympy.Or: "tensorflow.math.logical_or", + sympy.Not: "tensorflow.math.logical_not", + sympy.Max: "tensorflow.math.maximum", + sympy.Min: "tensorflow.math.minimum", + + # Matrices + sympy.MatAdd: "tensorflow.math.add", + sympy.HadamardProduct: "tensorflow.math.multiply", + sympy.Trace: "tensorflow.linalg.trace", + + # XXX May raise error for integer matrices. + sympy.Determinant : "tensorflow.linalg.det", + } + + _default_settings = dict( + AbstractPythonCodePrinter._default_settings, + tensorflow_version=None + ) + + def __init__(self, settings=None): + super().__init__(settings) + + version = self._settings['tensorflow_version'] + if version is None and tensorflow: + version = tensorflow.__version__ + self.tensorflow_version = version + + def _print_Function(self, expr): + op = self.mapping.get(type(expr), None) + if op is None: + return super()._print_Basic(expr) + children = [self._print(arg) for arg in expr.args] + if len(children) == 1: + return "%s(%s)" % ( + self._module_format(op), + children[0] + ) + else: + return self._expand_fold_binary_op(op, children) + + _print_Expr = _print_Function + _print_Application = _print_Function + _print_MatrixExpr = _print_Function + # TODO: a better class structure would avoid this mess: + _print_Relational = _print_Function + _print_Not = _print_Function + _print_And = _print_Function + _print_Or = _print_Function + _print_HadamardProduct = _print_Function + _print_Trace = _print_Function + _print_Determinant = _print_Function + + def _print_Inverse(self, expr): + op = self._module_format('tensorflow.linalg.inv') + return "{}({})".format(op, self._print(expr.arg)) + + def _print_Transpose(self, expr): + version = self.tensorflow_version + if version and version_tuple(version) < version_tuple('1.14'): + op = self._module_format('tensorflow.matrix_transpose') + else: + op = self._module_format('tensorflow.linalg.matrix_transpose') + return "{}({})".format(op, self._print(expr.arg)) + + def _print_Derivative(self, expr): + variables = expr.variables + if any(isinstance(i, Iterable) for i in variables): + raise NotImplementedError("derivation by multiple variables is not supported") + def unfold(expr, args): + if not args: + return self._print(expr) + return "%s(%s, %s)[0]" % ( + self._module_format("tensorflow.gradients"), + unfold(expr, args[:-1]), + self._print(args[-1]), + ) + return unfold(expr.expr, variables) + + def _print_Piecewise(self, expr): + version = self.tensorflow_version + if version and version_tuple(version) < version_tuple('1.0'): + tensorflow_piecewise = "tensorflow.select" + else: + tensorflow_piecewise = "tensorflow.where" + + from sympy.functions.elementary.piecewise import Piecewise + e, cond = expr.args[0].args + if len(expr.args) == 1: + return '{}({}, {}, {})'.format( + self._module_format(tensorflow_piecewise), + self._print(cond), + self._print(e), + 0) + + return '{}({}, {}, {})'.format( + self._module_format(tensorflow_piecewise), + self._print(cond), + self._print(e), + self._print(Piecewise(*expr.args[1:]))) + + def _print_Pow(self, expr): + # XXX May raise error for + # int**float or int**complex or float**complex + base, exp = expr.args + if expr.exp == S.Half: + return "{}({})".format( + self._module_format("tensorflow.math.sqrt"), self._print(base)) + return "{}({}, {})".format( + self._module_format("tensorflow.math.pow"), + self._print(base), self._print(exp)) + + def _print_MatrixBase(self, expr): + tensorflow_f = "tensorflow.Variable" if expr.free_symbols else "tensorflow.constant" + data = "["+", ".join(["["+", ".join([self._print(j) for j in i])+"]" for i in expr.tolist()])+"]" + return "%s(%s)" % ( + self._module_format(tensorflow_f), + data, + ) + + def _print_MatMul(self, expr): + from sympy.matrices.expressions import MatrixExpr + mat_args = [arg for arg in expr.args if isinstance(arg, MatrixExpr)] + args = [arg for arg in expr.args if arg not in mat_args] + if args: + return "%s*%s" % ( + self.parenthesize(Mul.fromiter(args), PRECEDENCE["Mul"]), + self._expand_fold_binary_op( + "tensorflow.linalg.matmul", mat_args) + ) + else: + return self._expand_fold_binary_op( + "tensorflow.linalg.matmul", mat_args) + + def _print_MatPow(self, expr): + return self._expand_fold_binary_op( + "tensorflow.linalg.matmul", [expr.base]*expr.exp) + + def _print_CodeBlock(self, expr): + # TODO: is this necessary? + ret = [] + for subexpr in expr.args: + ret.append(self._print(subexpr)) + return "\n".join(ret) + + def _print_isnan(self, exp): + return f'tensorflow.math.is_nan({self._print(*exp.args)})' + + def _print_isinf(self, exp): + return f'tensorflow.math.is_inf({self._print(*exp.args)})' + + _module = "tensorflow" + _einsum = "linalg.einsum" + _add = "math.add" + _transpose = "transpose" + _ones = "ones" + _zeros = "zeros" + + +def tensorflow_code(expr, **settings): + printer = TensorflowPrinter(settings) + return printer.doprint(expr) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_aesaracode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_aesaracode.py new file mode 100644 index 0000000000000000000000000000000000000000..13308af65b382e77de33302bcd75344d2b00adbf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_aesaracode.py @@ -0,0 +1,633 @@ +""" +Important note on tests in this module - the Aesara printing functions use a +global cache by default, which means that tests using it will modify global +state and thus not be independent from each other. Instead of using the "cache" +keyword argument each time, this module uses the aesara_code_ and +aesara_function_ functions defined below which default to using a new, empty +cache instead. +""" + +import logging + +from sympy.external import import_module +from sympy.testing.pytest import raises, SKIP, warns_deprecated_sympy + +from sympy.utilities.exceptions import ignore_warnings + + +aesaralogger = logging.getLogger('aesara.configdefaults') +aesaralogger.setLevel(logging.CRITICAL) +aesara = import_module('aesara') +aesaralogger.setLevel(logging.WARNING) + + +if aesara: + import numpy as np + aet = aesara.tensor + from aesara.scalar.basic import ScalarType + from aesara.graph.basic import Variable + from aesara.tensor.var import TensorVariable + from aesara.tensor.elemwise import Elemwise, DimShuffle + from aesara.tensor.math import Dot + + from sympy.printing.aesaracode import true_divide + + xt, yt, zt = [aet.scalar(name, 'floatX') for name in 'xyz'] + Xt, Yt, Zt = [aet.tensor('floatX', (False, False), name=n) for n in 'XYZ'] +else: + #bin/test will not execute any tests now + disabled = True + +import sympy as sy +from sympy.core.singleton import S +from sympy.abc import x, y, z, t +from sympy.printing.aesaracode import (aesara_code, dim_handling, + aesara_function) + + +# Default set of matrix symbols for testing - make square so we can both +# multiply and perform elementwise operations between them. +X, Y, Z = [sy.MatrixSymbol(n, 4, 4) for n in 'XYZ'] + +# For testing AppliedUndef +f_t = sy.Function('f')(t) + + +def aesara_code_(expr, **kwargs): + """ Wrapper for aesara_code that uses a new, empty cache by default. """ + kwargs.setdefault('cache', {}) + with warns_deprecated_sympy(): + return aesara_code(expr, **kwargs) + +def aesara_function_(inputs, outputs, **kwargs): + """ Wrapper for aesara_function that uses a new, empty cache by default. """ + kwargs.setdefault('cache', {}) + with warns_deprecated_sympy(): + return aesara_function(inputs, outputs, **kwargs) + + +def fgraph_of(*exprs): + """ Transform SymPy expressions into Aesara Computation. + + Parameters + ========== + exprs + SymPy expressions + + Returns + ======= + aesara.graph.fg.FunctionGraph + """ + outs = list(map(aesara_code_, exprs)) + ins = list(aesara.graph.basic.graph_inputs(outs)) + ins, outs = aesara.graph.basic.clone(ins, outs) + return aesara.graph.fg.FunctionGraph(ins, outs) + + +def aesara_simplify(fgraph): + """ Simplify a Aesara Computation. + + Parameters + ========== + fgraph : aesara.graph.fg.FunctionGraph + + Returns + ======= + aesara.graph.fg.FunctionGraph + """ + mode = aesara.compile.get_default_mode().excluding("fusion") + fgraph = fgraph.clone() + mode.optimizer.rewrite(fgraph) + return fgraph + + +def theq(a, b): + """ Test two Aesara objects for equality. + + Also accepts numeric types and lists/tuples of supported types. + + Note - debugprint() has a bug where it will accept numeric types but does + not respect the "file" argument and in this case and instead prints the number + to stdout and returns an empty string. This can lead to tests passing where + they should fail because any two numbers will always compare as equal. To + prevent this we treat numbers as a separate case. + """ + numeric_types = (int, float, np.number) + a_is_num = isinstance(a, numeric_types) + b_is_num = isinstance(b, numeric_types) + + # Compare numeric types using regular equality + if a_is_num or b_is_num: + if not (a_is_num and b_is_num): + return False + + return a == b + + # Compare sequences element-wise + a_is_seq = isinstance(a, (tuple, list)) + b_is_seq = isinstance(b, (tuple, list)) + + if a_is_seq or b_is_seq: + if not (a_is_seq and b_is_seq) or type(a) != type(b): + return False + + return list(map(theq, a)) == list(map(theq, b)) + + # Otherwise, assume debugprint() can handle it + astr = aesara.printing.debugprint(a, file='str') + bstr = aesara.printing.debugprint(b, file='str') + + # Check for bug mentioned above + for argname, argval, argstr in [('a', a, astr), ('b', b, bstr)]: + if argstr == '': + raise TypeError( + 'aesara.printing.debugprint(%s) returned empty string ' + '(%s is instance of %r)' + % (argname, argname, type(argval)) + ) + + return astr == bstr + + +def test_example_symbols(): + """ + Check that the example symbols in this module print to their Aesara + equivalents, as many of the other tests depend on this. + """ + assert theq(xt, aesara_code_(x)) + assert theq(yt, aesara_code_(y)) + assert theq(zt, aesara_code_(z)) + assert theq(Xt, aesara_code_(X)) + assert theq(Yt, aesara_code_(Y)) + assert theq(Zt, aesara_code_(Z)) + + +def test_Symbol(): + """ Test printing a Symbol to a aesara variable. """ + xx = aesara_code_(x) + assert isinstance(xx, Variable) + assert xx.broadcastable == () + assert xx.name == x.name + + xx2 = aesara_code_(x, broadcastables={x: (False,)}) + assert xx2.broadcastable == (False,) + assert xx2.name == x.name + +def test_MatrixSymbol(): + """ Test printing a MatrixSymbol to a aesara variable. """ + XX = aesara_code_(X) + assert isinstance(XX, TensorVariable) + assert XX.broadcastable == (False, False) + +@SKIP # TODO - this is currently not checked but should be implemented +def test_MatrixSymbol_wrong_dims(): + """ Test MatrixSymbol with invalid broadcastable. """ + bcs = [(), (False,), (True,), (True, False), (False, True,), (True, True)] + for bc in bcs: + with raises(ValueError): + aesara_code_(X, broadcastables={X: bc}) + +def test_AppliedUndef(): + """ Test printing AppliedUndef instance, which works similarly to Symbol. """ + ftt = aesara_code_(f_t) + assert isinstance(ftt, TensorVariable) + assert ftt.broadcastable == () + assert ftt.name == 'f_t' + + +def test_add(): + expr = x + y + comp = aesara_code_(expr) + assert comp.owner.op == aesara.tensor.add + +def test_trig(): + assert theq(aesara_code_(sy.sin(x)), aet.sin(xt)) + assert theq(aesara_code_(sy.tan(x)), aet.tan(xt)) + +def test_many(): + """ Test printing a complex expression with multiple symbols. """ + expr = sy.exp(x**2 + sy.cos(y)) * sy.log(2*z) + comp = aesara_code_(expr) + expected = aet.exp(xt**2 + aet.cos(yt)) * aet.log(2*zt) + assert theq(comp, expected) + + +def test_dtype(): + """ Test specifying specific data types through the dtype argument. """ + for dtype in ['float32', 'float64', 'int8', 'int16', 'int32', 'int64']: + assert aesara_code_(x, dtypes={x: dtype}).type.dtype == dtype + + # "floatX" type + assert aesara_code_(x, dtypes={x: 'floatX'}).type.dtype in ('float32', 'float64') + + # Type promotion + assert aesara_code_(x + 1, dtypes={x: 'float32'}).type.dtype == 'float32' + assert aesara_code_(x + y, dtypes={x: 'float64', y: 'float32'}).type.dtype == 'float64' + + +def test_broadcastables(): + """ Test the "broadcastables" argument when printing symbol-like objects. """ + + # No restrictions on shape + for s in [x, f_t]: + for bc in [(), (False,), (True,), (False, False), (True, False)]: + assert aesara_code_(s, broadcastables={s: bc}).broadcastable == bc + + # TODO - matrix broadcasting? + +def test_broadcasting(): + """ Test "broadcastable" attribute after applying element-wise binary op. """ + + expr = x + y + + cases = [ + [(), (), ()], + [(False,), (False,), (False,)], + [(True,), (False,), (False,)], + [(False, True), (False, False), (False, False)], + [(True, False), (False, False), (False, False)], + ] + + for bc1, bc2, bc3 in cases: + comp = aesara_code_(expr, broadcastables={x: bc1, y: bc2}) + assert comp.broadcastable == bc3 + + +def test_MatMul(): + expr = X*Y*Z + expr_t = aesara_code_(expr) + assert isinstance(expr_t.owner.op, Dot) + assert theq(expr_t, Xt.dot(Yt).dot(Zt)) + +def test_Transpose(): + assert isinstance(aesara_code_(X.T).owner.op, DimShuffle) + +def test_MatAdd(): + expr = X+Y+Z + assert isinstance(aesara_code_(expr).owner.op, Elemwise) + + +def test_Rationals(): + assert theq(aesara_code_(sy.Integer(2) / 3), true_divide(2, 3)) + assert theq(aesara_code_(S.Half), true_divide(1, 2)) + +def test_Integers(): + assert aesara_code_(sy.Integer(3)) == 3 + +def test_factorial(): + n = sy.Symbol('n') + assert aesara_code_(sy.factorial(n)) + +def test_Derivative(): + with ignore_warnings(UserWarning): + simp = lambda expr: aesara_simplify(fgraph_of(expr)) + assert theq(simp(aesara_code_(sy.Derivative(sy.sin(x), x, evaluate=False))), + simp(aesara.grad(aet.sin(xt), xt))) + + +def test_aesara_function_simple(): + """ Test aesara_function() with single output. """ + f = aesara_function_([x, y], [x+y]) + assert f(2, 3) == 5 + +def test_aesara_function_multi(): + """ Test aesara_function() with multiple outputs. """ + f = aesara_function_([x, y], [x+y, x-y]) + o1, o2 = f(2, 3) + assert o1 == 5 + assert o2 == -1 + +def test_aesara_function_numpy(): + """ Test aesara_function() vs Numpy implementation. """ + f = aesara_function_([x, y], [x+y], dim=1, + dtypes={x: 'float64', y: 'float64'}) + assert np.linalg.norm(f([1, 2], [3, 4]) - np.asarray([4, 6])) < 1e-9 + + f = aesara_function_([x, y], [x+y], dtypes={x: 'float64', y: 'float64'}, + dim=1) + xx = np.arange(3).astype('float64') + yy = 2*np.arange(3).astype('float64') + assert np.linalg.norm(f(xx, yy) - 3*np.arange(3)) < 1e-9 + + +def test_aesara_function_matrix(): + m = sy.Matrix([[x, y], [z, x + y + z]]) + expected = np.array([[1.0, 2.0], [3.0, 1.0 + 2.0 + 3.0]]) + f = aesara_function_([x, y, z], [m]) + np.testing.assert_allclose(f(1.0, 2.0, 3.0), expected) + f = aesara_function_([x, y, z], [m], scalar=True) + np.testing.assert_allclose(f(1.0, 2.0, 3.0), expected) + f = aesara_function_([x, y, z], [m, m]) + assert isinstance(f(1.0, 2.0, 3.0), type([])) + np.testing.assert_allclose(f(1.0, 2.0, 3.0)[0], expected) + np.testing.assert_allclose(f(1.0, 2.0, 3.0)[1], expected) + +def test_dim_handling(): + assert dim_handling([x], dim=2) == {x: (False, False)} + assert dim_handling([x, y], dims={x: 1, y: 2}) == {x: (False, True), + y: (False, False)} + assert dim_handling([x], broadcastables={x: (False,)}) == {x: (False,)} + +def test_aesara_function_kwargs(): + """ + Test passing additional kwargs from aesara_function() to aesara.function(). + """ + import numpy as np + f = aesara_function_([x, y, z], [x+y], dim=1, on_unused_input='ignore', + dtypes={x: 'float64', y: 'float64', z: 'float64'}) + assert np.linalg.norm(f([1, 2], [3, 4], [0, 0]) - np.asarray([4, 6])) < 1e-9 + + f = aesara_function_([x, y, z], [x+y], + dtypes={x: 'float64', y: 'float64', z: 'float64'}, + dim=1, on_unused_input='ignore') + xx = np.arange(3).astype('float64') + yy = 2*np.arange(3).astype('float64') + zz = 2*np.arange(3).astype('float64') + assert np.linalg.norm(f(xx, yy, zz) - 3*np.arange(3)) < 1e-9 + +def test_aesara_function_scalar(): + """ Test the "scalar" argument to aesara_function(). """ + from aesara.compile.function.types import Function + + args = [ + ([x, y], [x + y], None, [0]), # Single 0d output + ([X, Y], [X + Y], None, [2]), # Single 2d output + ([x, y], [x + y], {x: 0, y: 1}, [1]), # Single 1d output + ([x, y], [x + y, x - y], None, [0, 0]), # Two 0d outputs + ([x, y, X, Y], [x + y, X + Y], None, [0, 2]), # One 0d output, one 2d + ] + + # Create and test functions with and without the scalar setting + for inputs, outputs, in_dims, out_dims in args: + for scalar in [False, True]: + + f = aesara_function_(inputs, outputs, dims=in_dims, scalar=scalar) + + # Check the aesara_function attribute is set whether wrapped or not + assert isinstance(f.aesara_function, Function) + + # Feed in inputs of the appropriate size and get outputs + in_values = [ + np.ones([1 if bc else 5 for bc in i.type.broadcastable]) + for i in f.aesara_function.input_storage + ] + out_values = f(*in_values) + if not isinstance(out_values, list): + out_values = [out_values] + + # Check output types and shapes + assert len(out_dims) == len(out_values) + for d, value in zip(out_dims, out_values): + + if scalar and d == 0: + # Should have been converted to a scalar value + assert isinstance(value, np.number) + + else: + # Otherwise should be an array + assert isinstance(value, np.ndarray) + assert value.ndim == d + +def test_aesara_function_bad_kwarg(): + """ + Passing an unknown keyword argument to aesara_function() should raise an + exception. + """ + raises(Exception, lambda : aesara_function_([x], [x+1], foobar=3)) + + +def test_slice(): + assert aesara_code_(slice(1, 2, 3)) == slice(1, 2, 3) + + def theq_slice(s1, s2): + for attr in ['start', 'stop', 'step']: + a1 = getattr(s1, attr) + a2 = getattr(s2, attr) + if a1 is None or a2 is None: + if not (a1 is None or a2 is None): + return False + elif not theq(a1, a2): + return False + return True + + dtypes = {x: 'int32', y: 'int32'} + assert theq_slice(aesara_code_(slice(x, y), dtypes=dtypes), slice(xt, yt)) + assert theq_slice(aesara_code_(slice(1, x, 3), dtypes=dtypes), slice(1, xt, 3)) + +def test_MatrixSlice(): + cache = {} + + n = sy.Symbol('n', integer=True) + X = sy.MatrixSymbol('X', n, n) + + Y = X[1:2:3, 4:5:6] + Yt = aesara_code_(Y, cache=cache) + + s = ScalarType('int64') + assert tuple(Yt.owner.op.idx_list) == (slice(s, s, s), slice(s, s, s)) + assert Yt.owner.inputs[0] == aesara_code_(X, cache=cache) + # == doesn't work in Aesara like it does in SymPy. You have to use + # equals. + assert all(Yt.owner.inputs[i].data == i for i in range(1, 7)) + + k = sy.Symbol('k') + aesara_code_(k, dtypes={k: 'int32'}) + start, stop, step = 4, k, 2 + Y = X[start:stop:step] + Yt = aesara_code_(Y, dtypes={n: 'int32', k: 'int32'}) + # assert Yt.owner.op.idx_list[0].stop == kt + +def test_BlockMatrix(): + n = sy.Symbol('n', integer=True) + A, B, C, D = [sy.MatrixSymbol(name, n, n) for name in 'ABCD'] + At, Bt, Ct, Dt = map(aesara_code_, (A, B, C, D)) + Block = sy.BlockMatrix([[A, B], [C, D]]) + Blockt = aesara_code_(Block) + solutions = [aet.join(0, aet.join(1, At, Bt), aet.join(1, Ct, Dt)), + aet.join(1, aet.join(0, At, Ct), aet.join(0, Bt, Dt))] + assert any(theq(Blockt, solution) for solution in solutions) + +@SKIP +def test_BlockMatrix_Inverse_execution(): + k, n = 2, 4 + dtype = 'float32' + A = sy.MatrixSymbol('A', n, k) + B = sy.MatrixSymbol('B', n, n) + inputs = A, B + output = B.I*A + + cutsizes = {A: [(n//2, n//2), (k//2, k//2)], + B: [(n//2, n//2), (n//2, n//2)]} + cutinputs = [sy.blockcut(i, *cutsizes[i]) for i in inputs] + cutoutput = output.subs(dict(zip(inputs, cutinputs))) + + dtypes = dict(zip(inputs, [dtype]*len(inputs))) + f = aesara_function_(inputs, [output], dtypes=dtypes, cache={}) + fblocked = aesara_function_(inputs, [sy.block_collapse(cutoutput)], + dtypes=dtypes, cache={}) + + ninputs = [np.random.rand(*x.shape).astype(dtype) for x in inputs] + ninputs = [np.arange(n*k).reshape(A.shape).astype(dtype), + np.eye(n).astype(dtype)] + ninputs[1] += np.ones(B.shape)*1e-5 + + assert np.allclose(f(*ninputs), fblocked(*ninputs), rtol=1e-5) + +def test_DenseMatrix(): + from aesara.tensor.basic import Join + + t = sy.Symbol('theta') + for MatrixType in [sy.Matrix, sy.ImmutableMatrix]: + X = MatrixType([[sy.cos(t), -sy.sin(t)], [sy.sin(t), sy.cos(t)]]) + tX = aesara_code_(X) + assert isinstance(tX, TensorVariable) + assert isinstance(tX.owner.op, Join) + + +def test_cache_basic(): + """ Test single symbol-like objects are cached when printed by themselves. """ + + # Pairs of objects which should be considered equivalent with respect to caching + pairs = [ + (x, sy.Symbol('x')), + (X, sy.MatrixSymbol('X', *X.shape)), + (f_t, sy.Function('f')(sy.Symbol('t'))), + ] + + for s1, s2 in pairs: + cache = {} + st = aesara_code_(s1, cache=cache) + + # Test hit with same instance + assert aesara_code_(s1, cache=cache) is st + + # Test miss with same instance but new cache + assert aesara_code_(s1, cache={}) is not st + + # Test hit with different but equivalent instance + assert aesara_code_(s2, cache=cache) is st + +def test_global_cache(): + """ Test use of the global cache. """ + from sympy.printing.aesaracode import global_cache + + backup = dict(global_cache) + try: + # Temporarily empty global cache + global_cache.clear() + + for s in [x, X, f_t]: + with warns_deprecated_sympy(): + st = aesara_code(s) + assert aesara_code(s) is st + + finally: + # Restore global cache + global_cache.update(backup) + +def test_cache_types_distinct(): + """ + Test that symbol-like objects of different types (Symbol, MatrixSymbol, + AppliedUndef) are distinguished by the cache even if they have the same + name. + """ + symbols = [sy.Symbol('f_t'), sy.MatrixSymbol('f_t', 4, 4), f_t] + + cache = {} # Single shared cache + printed = {} + + for s in symbols: + st = aesara_code_(s, cache=cache) + assert st not in printed.values() + printed[s] = st + + # Check all printed objects are distinct + assert len(set(map(id, printed.values()))) == len(symbols) + + # Check retrieving + for s, st in printed.items(): + with warns_deprecated_sympy(): + assert aesara_code(s, cache=cache) is st + +def test_symbols_are_created_once(): + """ + Test that a symbol is cached and reused when it appears in an expression + more than once. + """ + expr = sy.Add(x, x, evaluate=False) + comp = aesara_code_(expr) + + assert theq(comp, xt + xt) + assert not theq(comp, xt + aesara_code_(x)) + +def test_cache_complex(): + """ + Test caching on a complicated expression with multiple symbols appearing + multiple times. + """ + expr = x ** 2 + (y - sy.exp(x)) * sy.sin(z - x * y) + symbol_names = {s.name for s in expr.free_symbols} + expr_t = aesara_code_(expr) + + # Iterate through variables in the Aesara computational graph that the + # printed expression depends on + seen = set() + for v in aesara.graph.basic.ancestors([expr_t]): + # Owner-less, non-constant variables should be our symbols + if v.owner is None and not isinstance(v, aesara.graph.basic.Constant): + # Check it corresponds to a symbol and appears only once + assert v.name in symbol_names + assert v.name not in seen + seen.add(v.name) + + # Check all were present + assert seen == symbol_names + + +def test_Piecewise(): + # A piecewise linear + expr = sy.Piecewise((0, x<0), (x, x<2), (1, True)) # ___/III + result = aesara_code_(expr) + assert result.owner.op == aet.switch + + expected = aet.switch(xt<0, 0, aet.switch(xt<2, xt, 1)) + assert theq(result, expected) + + expr = sy.Piecewise((x, x < 0)) + result = aesara_code_(expr) + expected = aet.switch(xt < 0, xt, np.nan) + assert theq(result, expected) + + expr = sy.Piecewise((0, sy.And(x>0, x<2)), \ + (x, sy.Or(x>2, x<0))) + result = aesara_code_(expr) + expected = aet.switch(aet.and_(xt>0,xt<2), 0, \ + aet.switch(aet.or_(xt>2, xt<0), xt, np.nan)) + assert theq(result, expected) + + +def test_Relationals(): + assert theq(aesara_code_(sy.Eq(x, y)), aet.eq(xt, yt)) + # assert theq(aesara_code_(sy.Ne(x, y)), aet.neq(xt, yt)) # TODO - implement + assert theq(aesara_code_(x > y), xt > yt) + assert theq(aesara_code_(x < y), xt < yt) + assert theq(aesara_code_(x >= y), xt >= yt) + assert theq(aesara_code_(x <= y), xt <= yt) + + +def test_complexfunctions(): + dtypes = {x:'complex128', y:'complex128'} + with warns_deprecated_sympy(): + xt, yt = aesara_code(x, dtypes=dtypes), aesara_code(y, dtypes=dtypes) + from sympy.functions.elementary.complexes import conjugate + from aesara.tensor import as_tensor_variable as atv + from aesara.tensor import complex as cplx + with warns_deprecated_sympy(): + assert theq(aesara_code(y*conjugate(x), dtypes=dtypes), yt*(xt.conj())) + assert theq(aesara_code((1+2j)*x), xt*(atv(1.0)+atv(2.0)*cplx(0,1))) + + +def test_constantfunctions(): + with warns_deprecated_sympy(): + tf = aesara_function([],[1+1j]) + assert(tf()==1+1j) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_c.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_c.py new file mode 100644 index 0000000000000000000000000000000000000000..626e7b6f244ea3227b886cd897d327f5d7bf66ec --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_c.py @@ -0,0 +1,888 @@ +from sympy.core import ( + S, pi, oo, Symbol, symbols, Rational, Integer, Float, Function, Mod, GoldenRatio, EulerGamma, Catalan, + Lambda, Dummy, nan, Mul, Pow, UnevaluatedExpr +) +from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne) +from sympy.functions import ( + Abs, acos, acosh, asin, asinh, atan, atanh, atan2, ceiling, cos, cosh, erf, + erfc, exp, floor, gamma, log, loggamma, Max, Min, Piecewise, sign, sin, sinh, + sqrt, tan, tanh, fibonacci, lucas +) +from sympy.sets import Range +from sympy.logic import ITE, Implies, Equivalent +from sympy.codegen import For, aug_assign, Assignment +from sympy.testing.pytest import raises, XFAIL +from sympy.printing.codeprinter import PrintMethodNotImplementedError +from sympy.printing.c import C89CodePrinter, C99CodePrinter, get_math_macros +from sympy.codegen.ast import ( + AddAugmentedAssignment, Element, Type, FloatType, Declaration, Pointer, Variable, value_const, pointer_const, + While, Scope, Print, FunctionPrototype, FunctionDefinition, FunctionCall, Return, + real, float32, float64, float80, float128, intc, Comment, CodeBlock, stderr, QuotedString +) +from sympy.codegen.cfunctions import expm1, log1p, exp2, log2, fma, log10, Cbrt, hypot, Sqrt, isnan, isinf +from sympy.codegen.cnodes import restrict +from sympy.utilities.lambdify import implemented_function +from sympy.tensor import IndexedBase, Idx +from sympy.matrices import Matrix, MatrixSymbol, SparseMatrix + +from sympy.printing.codeprinter import ccode + +x, y, z = symbols('x,y,z') + + +def test_printmethod(): + class fabs(Abs): + def _ccode(self, printer): + return "fabs(%s)" % printer._print(self.args[0]) + + assert ccode(fabs(x)) == "fabs(x)" + + +def test_ccode_sqrt(): + assert ccode(sqrt(x)) == "sqrt(x)" + assert ccode(x**0.5) == "sqrt(x)" + assert ccode(sqrt(x)) == "sqrt(x)" + + +def test_ccode_Pow(): + assert ccode(x**3) == "pow(x, 3)" + assert ccode(x**(y**3)) == "pow(x, pow(y, 3))" + g = implemented_function('g', Lambda(x, 2*x)) + assert ccode(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "pow(3.5*2*x, -x + pow(y, x))/(pow(x, 2) + y)" + assert ccode(x**-1.0) == '1.0/x' + assert ccode(x**Rational(2, 3)) == 'pow(x, 2.0/3.0)' + assert ccode(x**Rational(2, 3), type_aliases={real: float80}) == 'powl(x, 2.0L/3.0L)' + _cond_cfunc = [(lambda base, exp: exp.is_integer, "dpowi"), + (lambda base, exp: not exp.is_integer, "pow")] + assert ccode(x**3, user_functions={'Pow': _cond_cfunc}) == 'dpowi(x, 3)' + assert ccode(x**0.5, user_functions={'Pow': _cond_cfunc}) == 'pow(x, 0.5)' + assert ccode(x**Rational(16, 5), user_functions={'Pow': _cond_cfunc}) == 'pow(x, 16.0/5.0)' + _cond_cfunc2 = [(lambda base, exp: base == 2, lambda base, exp: 'exp2(%s)' % exp), + (lambda base, exp: base != 2, 'pow')] + # Related to gh-11353 + assert ccode(2**x, user_functions={'Pow': _cond_cfunc2}) == 'exp2(x)' + assert ccode(x**2, user_functions={'Pow': _cond_cfunc2}) == 'pow(x, 2)' + # For issue 14160 + assert ccode(Mul(-2, x, Pow(Mul(y,y,evaluate=False), -1, evaluate=False), + evaluate=False)) == '-2*x/(y*y)' + + +def test_ccode_Max(): + # Test for gh-11926 + assert ccode(Max(x,x*x),user_functions={"Max":"my_max", "Pow":"my_pow"}) == 'my_max(x, my_pow(x, 2))' + + +def test_ccode_Min_performance(): + #Shouldn't take more than a few seconds + big_min = Min(*symbols('a[0:50]')) + for curr_standard in ('c89', 'c99', 'c11'): + output = ccode(big_min, standard=curr_standard) + assert output.count('(') == output.count(')') + + +def test_ccode_constants_mathh(): + assert ccode(exp(1)) == "M_E" + assert ccode(pi) == "M_PI" + assert ccode(oo, standard='c89') == "HUGE_VAL" + assert ccode(-oo, standard='c89') == "-HUGE_VAL" + assert ccode(oo) == "INFINITY" + assert ccode(-oo, standard='c99') == "-INFINITY" + assert ccode(pi, type_aliases={real: float80}) == "M_PIl" + + +def test_ccode_constants_other(): + assert ccode(2*GoldenRatio) == "const double GoldenRatio = %s;\n2*GoldenRatio" % GoldenRatio.evalf(17) + assert ccode( + 2*Catalan) == "const double Catalan = %s;\n2*Catalan" % Catalan.evalf(17) + assert ccode(2*EulerGamma) == "const double EulerGamma = %s;\n2*EulerGamma" % EulerGamma.evalf(17) + + +def test_ccode_Rational(): + assert ccode(Rational(3, 7)) == "3.0/7.0" + assert ccode(Rational(3, 7), type_aliases={real: float80}) == "3.0L/7.0L" + assert ccode(Rational(18, 9)) == "2" + assert ccode(Rational(3, -7)) == "-3.0/7.0" + assert ccode(Rational(3, -7), type_aliases={real: float80}) == "-3.0L/7.0L" + assert ccode(Rational(-3, -7)) == "3.0/7.0" + assert ccode(Rational(-3, -7), type_aliases={real: float80}) == "3.0L/7.0L" + assert ccode(x + Rational(3, 7)) == "x + 3.0/7.0" + assert ccode(x + Rational(3, 7), type_aliases={real: float80}) == "x + 3.0L/7.0L" + assert ccode(Rational(3, 7)*x) == "(3.0/7.0)*x" + assert ccode(Rational(3, 7)*x, type_aliases={real: float80}) == "(3.0L/7.0L)*x" + + +def test_ccode_Integer(): + assert ccode(Integer(67)) == "67" + assert ccode(Integer(-1)) == "-1" + + +def test_ccode_functions(): + assert ccode(sin(x) ** cos(x)) == "pow(sin(x), cos(x))" + + +def test_ccode_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert ccode(g(x)) == "2*x" + g = implemented_function('g', Lambda(x, 2*x/Catalan)) + assert ccode( + g(x)) == "const double Catalan = %s;\n2*x/Catalan" % Catalan.evalf(17) + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + assert ccode(g(A[i]), assign_to=A[i]) == ( + "for (int i=0; i y" + assert ccode(Ge(x, y)) == "x >= y" + + +def test_ccode_Piecewise(): + expr = Piecewise((x, x < 1), (x**2, True)) + assert ccode(expr) == ( + "((x < 1) ? (\n" + " x\n" + ")\n" + ": (\n" + " pow(x, 2)\n" + "))") + assert ccode(expr, assign_to="c") == ( + "if (x < 1) {\n" + " c = x;\n" + "}\n" + "else {\n" + " c = pow(x, 2);\n" + "}") + expr = Piecewise((x, x < 1), (x + 1, x < 2), (x**2, True)) + assert ccode(expr) == ( + "((x < 1) ? (\n" + " x\n" + ")\n" + ": ((x < 2) ? (\n" + " x + 1\n" + ")\n" + ": (\n" + " pow(x, 2)\n" + ")))") + assert ccode(expr, assign_to='c') == ( + "if (x < 1) {\n" + " c = x;\n" + "}\n" + "else if (x < 2) {\n" + " c = x + 1;\n" + "}\n" + "else {\n" + " c = pow(x, 2);\n" + "}") + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: ccode(expr)) + + +def test_ccode_sinc(): + from sympy.functions.elementary.trigonometric import sinc + expr = sinc(x) + assert ccode(expr) == ( + "(((x != 0) ? (\n" + " sin(x)/x\n" + ")\n" + ": (\n" + " 1\n" + ")))") + + +def test_ccode_Piecewise_deep(): + p = ccode(2*Piecewise((x, x < 1), (x + 1, x < 2), (x**2, True))) + assert p == ( + "2*((x < 1) ? (\n" + " x\n" + ")\n" + ": ((x < 2) ? (\n" + " x + 1\n" + ")\n" + ": (\n" + " pow(x, 2)\n" + ")))") + expr = x*y*z + x**2 + y**2 + Piecewise((0, x < 0.5), (1, True)) + cos(z) - 1 + assert ccode(expr) == ( + "pow(x, 2) + x*y*z + pow(y, 2) + ((x < 0.5) ? (\n" + " 0\n" + ")\n" + ": (\n" + " 1\n" + ")) + cos(z) - 1") + assert ccode(expr, assign_to='c') == ( + "c = pow(x, 2) + x*y*z + pow(y, 2) + ((x < 0.5) ? (\n" + " 0\n" + ")\n" + ": (\n" + " 1\n" + ")) + cos(z) - 1;") + + +def test_ccode_ITE(): + expr = ITE(x < 1, y, z) + assert ccode(expr) == ( + "((x < 1) ? (\n" + " y\n" + ")\n" + ": (\n" + " z\n" + "))") + + +def test_ccode_settings(): + raises(TypeError, lambda: ccode(sin(x), method="garbage")) + + +def test_ccode_Indexed(): + s, n, m, o = symbols('s n m o', integer=True) + i, j, k = Idx('i', n), Idx('j', m), Idx('k', o) + + x = IndexedBase('x')[j] + A = IndexedBase('A')[i, j] + B = IndexedBase('B')[i, j, k] + + p = C99CodePrinter() + + assert p._print_Indexed(x) == 'x[j]' + assert p._print_Indexed(A) == 'A[%s]' % (m*i+j) + assert p._print_Indexed(B) == 'B[%s]' % (i*o*m+j*o+k) + + A = IndexedBase('A', shape=(5,3))[i, j] + assert p._print_Indexed(A) == 'A[%s]' % (3*i + j) + + A = IndexedBase('A', shape=(5,3), strides='F')[i, j] + assert ccode(A) == 'A[%s]' % (i + 5*j) + + A = IndexedBase('A', shape=(29,29), strides=(1, s), offset=o)[i, j] + assert ccode(A) == 'A[o + s*j + i]' + + Abase = IndexedBase('A', strides=(s, m, n), offset=o) + assert ccode(Abase[i, j, k]) == 'A[m*j + n*k + o + s*i]' + assert ccode(Abase[2, 3, k]) == 'A[3*m + n*k + o + 2*s]' + + +def test_Element(): + assert ccode(Element('x', 'ij')) == 'x[i][j]' + assert ccode(Element('x', 'ij', strides='kl', offset='o')) == 'x[i*k + j*l + o]' + assert ccode(Element('x', (3,))) == 'x[3]' + assert ccode(Element('x', (3,4,5))) == 'x[3][4][5]' + + +def test_ccode_Indexed_without_looking_for_contraction(): + len_y = 5 + y = IndexedBase('y', shape=(len_y,)) + x = IndexedBase('x', shape=(len_y,)) + Dy = IndexedBase('Dy', shape=(len_y-1,)) + i = Idx('i', len_y-1) + e = Eq(Dy[i], (y[i+1]-y[i])/(x[i+1]-x[i])) + code0 = ccode(e.rhs, assign_to=e.lhs, contract=False) + assert code0 == 'Dy[i] = (y[%s] - y[i])/(x[%s] - x[i]);' % (i + 1, i + 1) + + +def test_ccode_loops_matrix_vector(): + n, m = symbols('n m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + + s = ( + 'for (int i=0; i0), (y, True)), sin(z)]) + A = MatrixSymbol('A', 3, 1) + assert ccode(mat, A) == ( + "A[0] = x*y;\n" + "if (y > 0) {\n" + " A[1] = x + 2;\n" + "}\n" + "else {\n" + " A[1] = y;\n" + "}\n" + "A[2] = sin(z);") + # Test using MatrixElements in expressions + expr = Piecewise((2*A[2, 0], x > 0), (A[2, 0], True)) + sin(A[1, 0]) + A[0, 0] + assert ccode(expr) == ( + "((x > 0) ? (\n" + " 2*A[2]\n" + ")\n" + ": (\n" + " A[2]\n" + ")) + sin(A[1]) + A[0]") + # Test using MatrixElements in a Matrix + q = MatrixSymbol('q', 5, 1) + M = MatrixSymbol('M', 3, 3) + m = Matrix([[sin(q[1,0]), 0, cos(q[2,0])], + [q[1,0] + q[2,0], q[3, 0], 5], + [2*q[4, 0]/q[1,0], sqrt(q[0,0]) + 4, 0]]) + assert ccode(m, M) == ( + "M[0] = sin(q[1]);\n" + "M[1] = 0;\n" + "M[2] = cos(q[2]);\n" + "M[3] = q[1] + q[2];\n" + "M[4] = q[3];\n" + "M[5] = 5;\n" + "M[6] = 2*q[4]/q[1];\n" + "M[7] = sqrt(q[0]) + 4;\n" + "M[8] = 0;") + + +def test_sparse_matrix(): + # gh-15791 + with raises(PrintMethodNotImplementedError): + ccode(SparseMatrix([[1, 2, 3]])) + + assert 'Not supported in C' in C89CodePrinter({'strict': False}).doprint(SparseMatrix([[1, 2, 3]])) + + + +def test_ccode_reserved_words(): + x, y = symbols('x, if') + with raises(ValueError): + ccode(y**2, error_on_reserved=True, standard='C99') + assert ccode(y**2) == 'pow(if_, 2)' + assert ccode(x * y**2, dereference=[y]) == 'pow((*if_), 2)*x' + assert ccode(y**2, reserved_word_suffix='_unreserved') == 'pow(if_unreserved, 2)' + + +def test_ccode_sign(): + expr1, ref1 = sign(x) * y, 'y*(((x) > 0) - ((x) < 0))' + expr2, ref2 = sign(cos(x)), '(((cos(x)) > 0) - ((cos(x)) < 0))' + expr3, ref3 = sign(2 * x + x**2) * x + x**2, 'pow(x, 2) + x*(((pow(x, 2) + 2*x) > 0) - ((pow(x, 2) + 2*x) < 0))' + assert ccode(expr1) == ref1 + assert ccode(expr1, 'z') == 'z = %s;' % ref1 + assert ccode(expr2) == ref2 + assert ccode(expr3) == ref3 + +def test_ccode_Assignment(): + assert ccode(Assignment(x, y + z)) == 'x = y + z;' + assert ccode(aug_assign(x, '+', y + z)) == 'x += y + z;' + + +def test_ccode_For(): + f = For(x, Range(0, 10, 2), [aug_assign(y, '*', x)]) + assert ccode(f) == ("for (x = 0; x < 10; x += 2) {\n" + " y *= x;\n" + "}") + +def test_ccode_Max_Min(): + assert ccode(Max(x, 0), standard='C89') == '((0 > x) ? 0 : x)' + assert ccode(Max(x, 0), standard='C99') == 'fmax(0, x)' + assert ccode(Min(x, 0, sqrt(x)), standard='c89') == ( + '((0 < ((x < sqrt(x)) ? x : sqrt(x))) ? 0 : ((x < sqrt(x)) ? x : sqrt(x)))' + ) + +def test_ccode_standard(): + assert ccode(expm1(x), standard='c99') == 'expm1(x)' + assert ccode(nan, standard='c99') == 'NAN' + assert ccode(float('nan'), standard='c99') == 'NAN' + + +def test_C89CodePrinter(): + c89printer = C89CodePrinter() + assert c89printer.language == 'C' + assert c89printer.standard == 'C89' + assert 'void' in c89printer.reserved_words + assert 'template' not in c89printer.reserved_words + assert c89printer.doprint(log10(x)) == 'log10(x)' + + +def test_C99CodePrinter(): + assert C99CodePrinter().doprint(expm1(x)) == 'expm1(x)' + assert C99CodePrinter().doprint(log1p(x)) == 'log1p(x)' + assert C99CodePrinter().doprint(exp2(x)) == 'exp2(x)' + assert C99CodePrinter().doprint(log2(x)) == 'log2(x)' + assert C99CodePrinter().doprint(fma(x, y, -z)) == 'fma(x, y, -z)' + assert C99CodePrinter().doprint(log10(x)) == 'log10(x)' + assert C99CodePrinter().doprint(Cbrt(x)) == 'cbrt(x)' # note Cbrt due to cbrt already taken. + assert C99CodePrinter().doprint(hypot(x, y)) == 'hypot(x, y)' + assert C99CodePrinter().doprint(loggamma(x)) == 'lgamma(x)' + assert C99CodePrinter().doprint(Max(x, 3, x**2)) == 'fmax(3, fmax(x, pow(x, 2)))' + assert C99CodePrinter().doprint(Min(x, 3)) == 'fmin(3, x)' + c99printer = C99CodePrinter() + assert c99printer.language == 'C' + assert c99printer.standard == 'C99' + assert 'restrict' in c99printer.reserved_words + assert 'using' not in c99printer.reserved_words + + +@XFAIL +def test_C99CodePrinter__precision_f80(): + f80_printer = C99CodePrinter({"type_aliases": {real: float80}}) + assert f80_printer.doprint(sin(x + Float('2.1'))) == 'sinl(x + 2.1L)' + + +def test_C99CodePrinter__precision(): + n = symbols('n', integer=True) + p = symbols('p', integer=True, positive=True) + f32_printer = C99CodePrinter({"type_aliases": {real: float32}}) + f64_printer = C99CodePrinter({"type_aliases": {real: float64}}) + f80_printer = C99CodePrinter({"type_aliases": {real: float80}}) + assert f32_printer.doprint(sin(x+2.1)) == 'sinf(x + 2.1F)' + assert f64_printer.doprint(sin(x+2.1)) == 'sin(x + 2.1000000000000001)' + assert f80_printer.doprint(sin(x+Float('2.0'))) == 'sinl(x + 2.0L)' + + for printer, suffix in zip([f32_printer, f64_printer, f80_printer], ['f', '', 'l']): + def check(expr, ref): + assert printer.doprint(expr) == ref.format(s=suffix, S=suffix.upper()) + check(Abs(n), 'abs(n)') + check(Abs(x + 2.0), 'fabs{s}(x + 2.0{S})') + check(sin(x + 4.0)**cos(x - 2.0), 'pow{s}(sin{s}(x + 4.0{S}), cos{s}(x - 2.0{S}))') + check(exp(x*8.0), 'exp{s}(8.0{S}*x)') + check(exp2(x), 'exp2{s}(x)') + check(expm1(x*4.0), 'expm1{s}(4.0{S}*x)') + check(Mod(p, 2), 'p % 2') + check(Mod(2*p + 3, 3*p + 5, evaluate=False), '(2*p + 3) % (3*p + 5)') + check(Mod(x + 2.0, 3.0), 'fmod{s}(1.0{S}*x + 2.0{S}, 3.0{S})') + check(Mod(x, 2.0*x + 3.0), 'fmod{s}(1.0{S}*x, 2.0{S}*x + 3.0{S})') + check(log(x/2), 'log{s}((1.0{S}/2.0{S})*x)') + check(log10(3*x/2), 'log10{s}((3.0{S}/2.0{S})*x)') + check(log2(x*8.0), 'log2{s}(8.0{S}*x)') + check(log1p(x), 'log1p{s}(x)') + check(2**x, 'pow{s}(2, x)') + check(2.0**x, 'pow{s}(2.0{S}, x)') + check(x**3, 'pow{s}(x, 3)') + check(x**4.0, 'pow{s}(x, 4.0{S})') + check(sqrt(3+x), 'sqrt{s}(x + 3)') + check(Cbrt(x-2.0), 'cbrt{s}(x - 2.0{S})') + check(hypot(x, y), 'hypot{s}(x, y)') + check(sin(3.*x + 2.), 'sin{s}(3.0{S}*x + 2.0{S})') + check(cos(3.*x - 1.), 'cos{s}(3.0{S}*x - 1.0{S})') + check(tan(4.*y + 2.), 'tan{s}(4.0{S}*y + 2.0{S})') + check(asin(3.*x + 2.), 'asin{s}(3.0{S}*x + 2.0{S})') + check(acos(3.*x + 2.), 'acos{s}(3.0{S}*x + 2.0{S})') + check(atan(3.*x + 2.), 'atan{s}(3.0{S}*x + 2.0{S})') + check(atan2(3.*x, 2.*y), 'atan2{s}(3.0{S}*x, 2.0{S}*y)') + + check(sinh(3.*x + 2.), 'sinh{s}(3.0{S}*x + 2.0{S})') + check(cosh(3.*x - 1.), 'cosh{s}(3.0{S}*x - 1.0{S})') + check(tanh(4.0*y + 2.), 'tanh{s}(4.0{S}*y + 2.0{S})') + check(asinh(3.*x + 2.), 'asinh{s}(3.0{S}*x + 2.0{S})') + check(acosh(3.*x + 2.), 'acosh{s}(3.0{S}*x + 2.0{S})') + check(atanh(3.*x + 2.), 'atanh{s}(3.0{S}*x + 2.0{S})') + check(erf(42.*x), 'erf{s}(42.0{S}*x)') + check(erfc(42.*x), 'erfc{s}(42.0{S}*x)') + check(gamma(x), 'tgamma{s}(x)') + check(loggamma(x), 'lgamma{s}(x)') + + check(ceiling(x + 2.), "ceil{s}(x) + 2") + check(floor(x + 2.), "floor{s}(x) + 2") + check(fma(x, y, -z), 'fma{s}(x, y, -z)') + check(Max(x, 8.0, x**4.0), 'fmax{s}(8.0{S}, fmax{s}(x, pow{s}(x, 4.0{S})))') + check(Min(x, 2.0), 'fmin{s}(2.0{S}, x)') + + +def test_get_math_macros(): + macros = get_math_macros() + assert macros[exp(1)] == 'M_E' + assert macros[1/Sqrt(2)] == 'M_SQRT1_2' + + +def test_ccode_Declaration(): + i = symbols('i', integer=True) + var1 = Variable(i, type=Type.from_expr(i)) + dcl1 = Declaration(var1) + assert ccode(dcl1) == 'int i' + + var2 = Variable(x, type=float32, attrs={value_const}) + dcl2a = Declaration(var2) + assert ccode(dcl2a) == 'const float x' + dcl2b = var2.as_Declaration(value=pi) + assert ccode(dcl2b) == 'const float x = M_PI' + + var3 = Variable(y, type=Type('bool')) + dcl3 = Declaration(var3) + printer = C89CodePrinter() + assert 'stdbool.h' not in printer.headers + assert printer.doprint(dcl3) == 'bool y' + assert 'stdbool.h' in printer.headers + + u = symbols('u', real=True) + ptr4 = Pointer.deduced(u, attrs={pointer_const, restrict}) + dcl4 = Declaration(ptr4) + assert ccode(dcl4) == 'double * const restrict u' + + var5 = Variable(x, Type('__float128'), attrs={value_const}) + dcl5a = Declaration(var5) + assert ccode(dcl5a) == 'const __float128 x' + var5b = Variable(var5.symbol, var5.type, pi, attrs=var5.attrs) + dcl5b = Declaration(var5b) + assert ccode(dcl5b) == 'const __float128 x = M_PI' + + +def test_C99CodePrinter_custom_type(): + # We will look at __float128 (new in glibc 2.26) + f128 = FloatType('_Float128', float128.nbits, float128.nmant, float128.nexp) + p128 = C99CodePrinter({ + "type_aliases": {real: f128}, + "type_literal_suffixes": {f128: 'Q'}, + "type_func_suffixes": {f128: 'f128'}, + "type_math_macro_suffixes": { + real: 'f128', + f128: 'f128' + }, + "type_macros": { + f128: ('__STDC_WANT_IEC_60559_TYPES_EXT__',) + } + }) + assert p128.doprint(x) == 'x' + assert not p128.headers + assert not p128.libraries + assert not p128.macros + assert p128.doprint(2.0) == '2.0Q' + assert not p128.headers + assert not p128.libraries + assert p128.macros == {'__STDC_WANT_IEC_60559_TYPES_EXT__'} + + assert p128.doprint(Rational(1, 2)) == '1.0Q/2.0Q' + assert p128.doprint(sin(x)) == 'sinf128(x)' + assert p128.doprint(cos(2., evaluate=False)) == 'cosf128(2.0Q)' + assert p128.doprint(x**-1.0) == '1.0Q/x' + + var5 = Variable(x, f128, attrs={value_const}) + + dcl5a = Declaration(var5) + assert ccode(dcl5a) == 'const _Float128 x' + var5b = Variable(x, f128, pi, attrs={value_const}) + dcl5b = Declaration(var5b) + assert p128.doprint(dcl5b) == 'const _Float128 x = M_PIf128' + var5b = Variable(x, f128, value=Catalan.evalf(38), attrs={value_const}) + dcl5c = Declaration(var5b) + assert p128.doprint(dcl5c) == 'const _Float128 x = %sQ' % Catalan.evalf(f128.decimal_dig) + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(ccode(A[0, 0]) == "A[0]") + assert(ccode(3 * A[0, 0]) == "3*A[0]") + + F = C[0, 0].subs(C, A - B) + assert(ccode(F) == "(A - B)[0]") + +def test_ccode_math_macros(): + assert ccode(z + exp(1)) == 'z + M_E' + assert ccode(z + log2(exp(1))) == 'z + M_LOG2E' + assert ccode(z + 1/log(2)) == 'z + M_LOG2E' + assert ccode(z + log(2)) == 'z + M_LN2' + assert ccode(z + log(10)) == 'z + M_LN10' + assert ccode(z + pi) == 'z + M_PI' + assert ccode(z + pi/2) == 'z + M_PI_2' + assert ccode(z + pi/4) == 'z + M_PI_4' + assert ccode(z + 1/pi) == 'z + M_1_PI' + assert ccode(z + 2/pi) == 'z + M_2_PI' + assert ccode(z + 2/sqrt(pi)) == 'z + M_2_SQRTPI' + assert ccode(z + 2/Sqrt(pi)) == 'z + M_2_SQRTPI' + assert ccode(z + sqrt(2)) == 'z + M_SQRT2' + assert ccode(z + Sqrt(2)) == 'z + M_SQRT2' + assert ccode(z + 1/sqrt(2)) == 'z + M_SQRT1_2' + assert ccode(z + 1/Sqrt(2)) == 'z + M_SQRT1_2' + + +def test_ccode_Type(): + assert ccode(Type('float')) == 'float' + assert ccode(intc) == 'int' + + +def test_ccode_codegen_ast(): + # Note that C only allows comments of the form /* ... */, double forward + # slash is not standard C, and some C compilers will grind to a halt upon + # encountering them. + assert ccode(Comment("this is a comment")) == "/* this is a comment */" # not // + assert ccode(While(abs(x) > 1, [aug_assign(x, '-', 1)])) == ( + 'while (fabs(x) > 1) {\n' + ' x -= 1;\n' + '}' + ) + assert ccode(Scope([AddAugmentedAssignment(x, 1)])) == ( + '{\n' + ' x += 1;\n' + '}' + ) + inp_x = Declaration(Variable(x, type=real)) + assert ccode(FunctionPrototype(real, 'pwer', [inp_x])) == 'double pwer(double x)' + assert ccode(FunctionDefinition(real, 'pwer', [inp_x], [Assignment(x, x**2)])) == ( + 'double pwer(double x){\n' + ' x = pow(x, 2);\n' + '}' + ) + + # Elements of CodeBlock are formatted as statements: + block = CodeBlock( + x, + Print([x, y], "%d %d"), + Print([QuotedString('hello'), y], "%s %d", file=stderr), + FunctionCall('pwer', [x]), + Return(x), + ) + assert ccode(block) == '\n'.join([ + 'x;', + 'printf("%d %d", x, y);', + 'fprintf(stderr, "%s %d", "hello", y);', + 'pwer(x);', + 'return x;', + ]) + +def test_ccode_UnevaluatedExpr(): + assert ccode(UnevaluatedExpr(y * x) + z) == "z + x*y" + assert ccode(UnevaluatedExpr(y + x) + z) == "z + (x + y)" # gh-21955 + w = symbols('w') + assert ccode(UnevaluatedExpr(y + x) + UnevaluatedExpr(z + w)) == "(w + z) + (x + y)" + + p, q, r = symbols("p q r", real=True) + q_r = UnevaluatedExpr(q + r) + expr = abs(exp(p+q_r)) + assert ccode(expr) == "exp(p + (q + r))" + + +def test_ccode_array_like_containers(): + assert ccode([2,3,4]) == "{2, 3, 4}" + assert ccode((2,3,4)) == "{2, 3, 4}" + +def test_ccode__isinf_isnan(): + assert ccode(isinf(x)) == 'isinf(x)' + assert ccode(isnan(x)) == 'isnan(x)' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_codeprinter.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_codeprinter.py new file mode 100644 index 0000000000000000000000000000000000000000..4b077037eb84e218fcfd4a05fc03e40b211e45b9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_codeprinter.py @@ -0,0 +1,77 @@ +from sympy.printing.codeprinter import CodePrinter, PrintMethodNotImplementedError +from sympy.core import symbols +from sympy.core.symbol import Dummy +from sympy.testing.pytest import raises +from sympy import cos +from sympy.utilities.lambdify import lambdify +from math import cos as math_cos +from sympy.printing.lambdarepr import LambdaPrinter + + +def setup_test_printer(**kwargs): + p = CodePrinter(settings=kwargs) + p._not_supported = set() + p._number_symbols = set() + return p + + +def test_print_Dummy(): + d = Dummy('d') + p = setup_test_printer() + assert p._print_Dummy(d) == "d_%i" % d.dummy_index + +def test_print_Symbol(): + + x, y = symbols('x, if') + + p = setup_test_printer() + assert p._print(x) == 'x' + assert p._print(y) == 'if' + + p.reserved_words.update(['if']) + assert p._print(y) == 'if_' + + p = setup_test_printer(error_on_reserved=True) + p.reserved_words.update(['if']) + with raises(ValueError): + p._print(y) + + p = setup_test_printer(reserved_word_suffix='_He_Man') + p.reserved_words.update(['if']) + assert p._print(y) == 'if_He_Man' + + +def test_lambdify_LaTeX_symbols_issue_23374(): + # Create symbols with Latex style names + x1, x2 = symbols("x_{1} x_2") + + # Lambdify the function + f1 = lambdify([x1, x2], cos(x1 ** 2 + x2 ** 2)) + + # Test that the function works correctly (numerically) + assert f1(1, 2) == math_cos(1 ** 2 + 2 ** 2) + + # Explicitly generate a custom printer to verify the naming convention + p = LambdaPrinter() + expr_str = p.doprint(cos(x1 ** 2 + x2 ** 2)) + assert 'x_1' in expr_str + assert 'x_2' in expr_str + + +def test_issue_15791(): + class CrashingCodePrinter(CodePrinter): + def emptyPrinter(self, obj): + raise NotImplementedError + + from sympy.matrices import ( + MutableSparseMatrix, + ImmutableSparseMatrix, + ) + + c = CrashingCodePrinter() + + # these should not silently succeed + with raises(PrintMethodNotImplementedError): + c.doprint(ImmutableSparseMatrix(2, 2, {})) + with raises(PrintMethodNotImplementedError): + c.doprint(MutableSparseMatrix(2, 2, {})) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_conventions.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_conventions.py new file mode 100644 index 0000000000000000000000000000000000000000..e8f1fa8532f96130828b89d1ba5ba11fd5bed7a4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_conventions.py @@ -0,0 +1,116 @@ +# -*- coding: utf-8 -*- + +from sympy.core.function import (Derivative, Function) +from sympy.core.numbers import oo +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import cos +from sympy.integrals.integrals import Integral +from sympy.functions.special.bessel import besselj +from sympy.functions.special.polynomials import legendre +from sympy.functions.combinatorial.numbers import bell +from sympy.printing.conventions import split_super_sub, requires_partial +from sympy.testing.pytest import XFAIL + +def test_super_sub(): + assert split_super_sub("beta_13_2") == ("beta", [], ["13", "2"]) + assert split_super_sub("beta_132_20") == ("beta", [], ["132", "20"]) + assert split_super_sub("beta_13") == ("beta", [], ["13"]) + assert split_super_sub("x_a_b") == ("x", [], ["a", "b"]) + assert split_super_sub("x_1_2_3") == ("x", [], ["1", "2", "3"]) + assert split_super_sub("x_a_b1") == ("x", [], ["a", "b1"]) + assert split_super_sub("x_a_1") == ("x", [], ["a", "1"]) + assert split_super_sub("x_1_a") == ("x", [], ["1", "a"]) + assert split_super_sub("x_1^aa") == ("x", ["aa"], ["1"]) + assert split_super_sub("x_1__aa") == ("x", ["aa"], ["1"]) + assert split_super_sub("x_11^a") == ("x", ["a"], ["11"]) + assert split_super_sub("x_11__a") == ("x", ["a"], ["11"]) + assert split_super_sub("x_a_b_c_d") == ("x", [], ["a", "b", "c", "d"]) + assert split_super_sub("x_a_b^c^d") == ("x", ["c", "d"], ["a", "b"]) + assert split_super_sub("x_a_b__c__d") == ("x", ["c", "d"], ["a", "b"]) + assert split_super_sub("x_a^b_c^d") == ("x", ["b", "d"], ["a", "c"]) + assert split_super_sub("x_a__b_c__d") == ("x", ["b", "d"], ["a", "c"]) + assert split_super_sub("x^a^b_c_d") == ("x", ["a", "b"], ["c", "d"]) + assert split_super_sub("x__a__b_c_d") == ("x", ["a", "b"], ["c", "d"]) + assert split_super_sub("x^a^b^c^d") == ("x", ["a", "b", "c", "d"], []) + assert split_super_sub("x__a__b__c__d") == ("x", ["a", "b", "c", "d"], []) + assert split_super_sub("alpha_11") == ("alpha", [], ["11"]) + assert split_super_sub("alpha_11_11") == ("alpha", [], ["11", "11"]) + assert split_super_sub("w1") == ("w", [], ["1"]) + assert split_super_sub("w𝟙") == ("w", [], ["𝟙"]) + assert split_super_sub("w11") == ("w", [], ["11"]) + assert split_super_sub("w𝟙𝟙") == ("w", [], ["𝟙𝟙"]) + assert split_super_sub("w𝟙2𝟙") == ("w", [], ["𝟙2𝟙"]) + assert split_super_sub("w1^a") == ("w", ["a"], ["1"]) + assert split_super_sub("ω1") == ("ω", [], ["1"]) + assert split_super_sub("ω11") == ("ω", [], ["11"]) + assert split_super_sub("ω1^a") == ("ω", ["a"], ["1"]) + assert split_super_sub("ω𝟙^α") == ("ω", ["α"], ["𝟙"]) + assert split_super_sub("ω𝟙2^3α") == ("ω", ["3α"], ["𝟙2"]) + assert split_super_sub("") == ("", [], []) + + +def test_requires_partial(): + x, y, z, t, nu = symbols('x y z t nu') + n = symbols('n', integer=True) + + f = x * y + assert requires_partial(Derivative(f, x)) is True + assert requires_partial(Derivative(f, y)) is True + + ## integrating out one of the variables + assert requires_partial(Derivative(Integral(exp(-x * y), (x, 0, oo)), y, evaluate=False)) is False + + ## bessel function with smooth parameter + f = besselj(nu, x) + assert requires_partial(Derivative(f, x)) is True + assert requires_partial(Derivative(f, nu)) is True + + ## bessel function with integer parameter + f = besselj(n, x) + assert requires_partial(Derivative(f, x)) is False + # this is not really valid (differentiating with respect to an integer) + # but there's no reason to use the partial derivative symbol there. make + # sure we don't throw an exception here, though + assert requires_partial(Derivative(f, n)) is False + + ## bell polynomial + f = bell(n, x) + assert requires_partial(Derivative(f, x)) is False + # again, invalid + assert requires_partial(Derivative(f, n)) is False + + ## legendre polynomial + f = legendre(0, x) + assert requires_partial(Derivative(f, x)) is False + + f = legendre(n, x) + assert requires_partial(Derivative(f, x)) is False + # again, invalid + assert requires_partial(Derivative(f, n)) is False + + f = x ** n + assert requires_partial(Derivative(f, x)) is False + + assert requires_partial(Derivative(Integral((x*y) ** n * exp(-x * y), (x, 0, oo)), y, evaluate=False)) is False + + # parametric equation + f = (exp(t), cos(t)) + g = sum(f) + assert requires_partial(Derivative(g, t)) is False + + f = symbols('f', cls=Function) + assert requires_partial(Derivative(f(x), x)) is False + assert requires_partial(Derivative(f(x), y)) is False + assert requires_partial(Derivative(f(x, y), x)) is True + assert requires_partial(Derivative(f(x, y), y)) is True + assert requires_partial(Derivative(f(x, y), z)) is True + assert requires_partial(Derivative(f(x, y), x, y)) is True + +@XFAIL +def test_requires_partial_unspecified_variables(): + x, y = symbols('x y') + # function of unspecified variables + f = symbols('f', cls=Function) + assert requires_partial(Derivative(f, x)) is False + assert requires_partial(Derivative(f, x, y)) is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cupy.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cupy.py new file mode 100644 index 0000000000000000000000000000000000000000..cf111ec1623390a3dbbf489235d2ed387624a36c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cupy.py @@ -0,0 +1,56 @@ +from sympy.concrete.summations import Sum +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.utilities.lambdify import lambdify +from sympy.abc import x, i, a, b +from sympy.codegen.numpy_nodes import logaddexp +from sympy.printing.numpy import CuPyPrinter, _cupy_known_constants, _cupy_known_functions + +from sympy.testing.pytest import skip, raises +from sympy.external import import_module + +cp = import_module('cupy') + +def test_cupy_print(): + prntr = CuPyPrinter() + assert prntr.doprint(logaddexp(a, b)) == 'cupy.logaddexp(a, b)' + assert prntr.doprint(sqrt(x)) == 'cupy.sqrt(x)' + assert prntr.doprint(log(x)) == 'cupy.log(x)' + assert prntr.doprint("acos(x)") == 'cupy.arccos(x)' + assert prntr.doprint("exp(x)") == 'cupy.exp(x)' + assert prntr.doprint("Abs(x)") == 'abs(x)' + +def test_not_cupy_print(): + prntr = CuPyPrinter() + with raises(NotImplementedError): + prntr.doprint("abcd(x)") + +def test_cupy_sum(): + if not cp: + skip("CuPy not installed") + + s = Sum(x ** i, (i, a, b)) + f = lambdify((a, b, x), s, 'cupy') + + a_, b_ = 0, 10 + x_ = cp.linspace(-1, +1, 10) + assert cp.allclose(f(a_, b_, x_), sum(x_ ** i_ for i_ in range(a_, b_ + 1))) + + s = Sum(i * x, (i, a, b)) + f = lambdify((a, b, x), s, 'numpy') + + a_, b_ = 0, 10 + x_ = cp.linspace(-1, +1, 10) + assert cp.allclose(f(a_, b_, x_), sum(i_ * x_ for i_ in range(a_, b_ + 1))) + +def test_cupy_known_funcs_consts(): + assert _cupy_known_constants['NaN'] == 'cupy.nan' + assert _cupy_known_constants['EulerGamma'] == 'cupy.euler_gamma' + + assert _cupy_known_functions['acos'] == 'cupy.arccos' + assert _cupy_known_functions['log'] == 'cupy.log' + +def test_cupy_print_methods(): + prntr = CuPyPrinter() + assert hasattr(prntr, '_print_acos') + assert hasattr(prntr, '_print_log') diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cxx.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cxx.py new file mode 100644 index 0000000000000000000000000000000000000000..d84ec75cbf0eeb60a1176b9cb3b401a3384454e7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_cxx.py @@ -0,0 +1,86 @@ +from sympy.core.numbers import Float, Integer, Rational +from sympy.core.symbol import symbols +from sympy.functions import beta, Ei, zeta, Max, Min, sqrt, riemann_xi, frac +from sympy.printing.cxx import CXX98CodePrinter, CXX11CodePrinter, CXX17CodePrinter, cxxcode +from sympy.codegen.cfunctions import log1p + + +x, y, u, v = symbols('x y u v') + + +def test_CXX98CodePrinter(): + assert CXX98CodePrinter().doprint(Max(x, 3)) in ('std::max(x, 3)', 'std::max(3, x)') + assert CXX98CodePrinter().doprint(Min(x, 3, sqrt(x))) == 'std::min(3, std::min(x, std::sqrt(x)))' + cxx98printer = CXX98CodePrinter() + assert cxx98printer.language == 'C++' + assert cxx98printer.standard == 'C++98' + assert 'template' in cxx98printer.reserved_words + assert 'alignas' not in cxx98printer.reserved_words + + +def test_CXX11CodePrinter(): + assert CXX11CodePrinter().doprint(log1p(x)) == 'std::log1p(x)' + + cxx11printer = CXX11CodePrinter() + assert cxx11printer.language == 'C++' + assert cxx11printer.standard == 'C++11' + assert 'operator' in cxx11printer.reserved_words + assert 'noexcept' in cxx11printer.reserved_words + assert 'concept' not in cxx11printer.reserved_words + + +def test_subclass_print_method(): + class MyPrinter(CXX11CodePrinter): + def _print_log1p(self, expr): + return 'my_library::log1p(%s)' % ', '.join(map(self._print, expr.args)) + + assert MyPrinter().doprint(log1p(x)) == 'my_library::log1p(x)' + + +def test_subclass_print_method__ns(): + class MyPrinter(CXX11CodePrinter): + _ns = 'my_library::' + + p = CXX11CodePrinter() + myp = MyPrinter() + + assert p.doprint(log1p(x)) == 'std::log1p(x)' + assert myp.doprint(log1p(x)) == 'my_library::log1p(x)' + + +def test_CXX17CodePrinter(): + assert CXX17CodePrinter().doprint(beta(x, y)) == 'std::beta(x, y)' + assert CXX17CodePrinter().doprint(Ei(x)) == 'std::expint(x)' + assert CXX17CodePrinter().doprint(zeta(x)) == 'std::riemann_zeta(x)' + + # Automatic rewrite + assert CXX17CodePrinter().doprint(frac(x)) == '(x - std::floor(x))' + assert CXX17CodePrinter().doprint(riemann_xi(x)) == '((1.0/2.0)*std::pow(M_PI, -1.0/2.0*x)*x*(x - 1)*std::tgamma((1.0/2.0)*x)*std::riemann_zeta(x))' + + +def test_cxxcode(): + assert sorted(cxxcode(sqrt(x)*.5).split('*')) == sorted(['0.5', 'std::sqrt(x)']) + +def test_cxxcode_nested_minmax(): + assert cxxcode(Max(Min(x, y), Min(u, v))) \ + == 'std::max(std::min(u, v), std::min(x, y))' + assert cxxcode(Min(Max(x, y), Max(u, v))) \ + == 'std::min(std::max(u, v), std::max(x, y))' + +def test_subclass_Integer_Float(): + class MyPrinter(CXX17CodePrinter): + def _print_Integer(self, arg): + return 'bigInt("%s")' % super()._print_Integer(arg) + + def _print_Float(self, arg): + rat = Rational(arg) + return 'bigFloat(%s, %s)' % ( + self._print(Integer(rat.p)), + self._print(Integer(rat.q)) + ) + + p = MyPrinter() + for i in range(13): + assert p.doprint(i) == 'bigInt("%d")' % i + assert p.doprint(Float(0.5)) == 'bigFloat(bigInt("1"), bigInt("2"))' + assert p.doprint(x**-1.0) == 'bigFloat(bigInt("1"), bigInt("1"))/x' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_dot.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_dot.py new file mode 100644 index 0000000000000000000000000000000000000000..6213e237fb7aac6460a956b4c9fc1f7c8710fec6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_dot.py @@ -0,0 +1,134 @@ +from sympy.printing.dot import (purestr, styleof, attrprint, dotnode, + dotedges, dotprint) +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.numbers import (Float, Integer) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.printing.repr import srepr +from sympy.abc import x + + +def test_purestr(): + assert purestr(Symbol('x')) == "Symbol('x')" + assert purestr(Basic(S(1), S(2))) == "Basic(Integer(1), Integer(2))" + assert purestr(Float(2)) == "Float('2.0', precision=53)" + + assert purestr(Symbol('x'), with_args=True) == ("Symbol('x')", ()) + assert purestr(Basic(S(1), S(2)), with_args=True) == \ + ('Basic(Integer(1), Integer(2))', ('Integer(1)', 'Integer(2)')) + assert purestr(Float(2), with_args=True) == \ + ("Float('2.0', precision=53)", ()) + + +def test_styleof(): + styles = [(Basic, {'color': 'blue', 'shape': 'ellipse'}), + (Expr, {'color': 'black'})] + assert styleof(Basic(S(1)), styles) == {'color': 'blue', 'shape': 'ellipse'} + + assert styleof(x + 1, styles) == {'color': 'black', 'shape': 'ellipse'} + + +def test_attrprint(): + assert attrprint({'color': 'blue', 'shape': 'ellipse'}) == \ + '"color"="blue", "shape"="ellipse"' + +def test_dotnode(): + + assert dotnode(x, repeat=False) == \ + '"Symbol(\'x\')" ["color"="black", "label"="x", "shape"="ellipse"];' + assert dotnode(x+2, repeat=False) == \ + '"Add(Integer(2), Symbol(\'x\'))" ' \ + '["color"="black", "label"="Add", "shape"="ellipse"];', \ + dotnode(x+2,repeat=0) + + assert dotnode(x + x**2, repeat=False) == \ + '"Add(Symbol(\'x\'), Pow(Symbol(\'x\'), Integer(2)))" ' \ + '["color"="black", "label"="Add", "shape"="ellipse"];' + assert dotnode(x + x**2, repeat=True) == \ + '"Add(Symbol(\'x\'), Pow(Symbol(\'x\'), Integer(2)))_()" ' \ + '["color"="black", "label"="Add", "shape"="ellipse"];' + +def test_dotedges(): + assert sorted(dotedges(x+2, repeat=False)) == [ + '"Add(Integer(2), Symbol(\'x\'))" -> "Integer(2)";', + '"Add(Integer(2), Symbol(\'x\'))" -> "Symbol(\'x\')";' + ] + assert sorted(dotedges(x + 2, repeat=True)) == [ + '"Add(Integer(2), Symbol(\'x\'))_()" -> "Integer(2)_(0,)";', + '"Add(Integer(2), Symbol(\'x\'))_()" -> "Symbol(\'x\')_(1,)";' + ] + +def test_dotprint(): + text = dotprint(x+2, repeat=False) + assert all(e in text for e in dotedges(x+2, repeat=False)) + assert all( + n in text for n in [dotnode(expr, repeat=False) + for expr in (x, Integer(2), x+2)]) + assert 'digraph' in text + + text = dotprint(x+x**2, repeat=False) + assert all(e in text for e in dotedges(x+x**2, repeat=False)) + assert all( + n in text for n in [dotnode(expr, repeat=False) + for expr in (x, Integer(2), x**2)]) + assert 'digraph' in text + + text = dotprint(x+x**2, repeat=True) + assert all(e in text for e in dotedges(x+x**2, repeat=True)) + assert all( + n in text for n in [dotnode(expr, pos=()) + for expr in [x + x**2]]) + + text = dotprint(x**x, repeat=True) + assert all(e in text for e in dotedges(x**x, repeat=True)) + assert all( + n in text for n in [dotnode(x, pos=(0,)), dotnode(x, pos=(1,))]) + assert 'digraph' in text + +def test_dotprint_depth(): + text = dotprint(3*x+2, depth=1) + assert dotnode(3*x+2) in text + assert dotnode(x) not in text + text = dotprint(3*x+2) + assert "depth" not in text + +def test_Matrix_and_non_basics(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + n = Symbol('n') + assert dotprint(MatrixSymbol('X', n, n)) == \ +"""digraph{ + +# Graph style +"ordering"="out" +"rankdir"="TD" + +######### +# Nodes # +######### + +"MatrixSymbol(Str('X'), Symbol('n'), Symbol('n'))_()" ["color"="black", "label"="MatrixSymbol", "shape"="ellipse"]; +"Str('X')_(0,)" ["color"="blue", "label"="X", "shape"="ellipse"]; +"Symbol('n')_(1,)" ["color"="black", "label"="n", "shape"="ellipse"]; +"Symbol('n')_(2,)" ["color"="black", "label"="n", "shape"="ellipse"]; + +######### +# Edges # +######### + +"MatrixSymbol(Str('X'), Symbol('n'), Symbol('n'))_()" -> "Str('X')_(0,)"; +"MatrixSymbol(Str('X'), Symbol('n'), Symbol('n'))_()" -> "Symbol('n')_(1,)"; +"MatrixSymbol(Str('X'), Symbol('n'), Symbol('n'))_()" -> "Symbol('n')_(2,)"; +}""" + + +def test_labelfunc(): + text = dotprint(x + 2, labelfunc=srepr) + assert "Symbol('x')" in text + assert "Integer(2)" in text + + +def test_commutative(): + x, y = symbols('x y', commutative=False) + assert dotprint(x + y) == dotprint(y + x) + assert dotprint(x*y) != dotprint(y*x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_fortran.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_fortran.py new file mode 100644 index 0000000000000000000000000000000000000000..c28a1ea16dcf2157b58d763286428dccc1944b71 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_fortran.py @@ -0,0 +1,854 @@ +from sympy.core.add import Add +from sympy.core.expr import Expr +from sympy.core.function import (Function, Lambda, diff) +from sympy.core.mod import Mod +from sympy.core import (Catalan, EulerGamma, GoldenRatio) +from sympy.core.numbers import (E, Float, I, Integer, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (conjugate, sign) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (atan2, cos, sin) +from sympy.functions.special.gamma_functions import gamma +from sympy.integrals.integrals import Integral +from sympy.sets.fancysets import Range + +from sympy.codegen import For, Assignment, aug_assign +from sympy.codegen.ast import Declaration, Variable, float32, float64, \ + value_const, real, bool_, While, FunctionPrototype, FunctionDefinition, \ + integer, Return, Element +from sympy.core.expr import UnevaluatedExpr +from sympy.core.relational import Relational +from sympy.logic.boolalg import And, Or, Not, Equivalent, Xor +from sympy.matrices import Matrix, MatrixSymbol +from sympy.printing.fortran import fcode, FCodePrinter +from sympy.tensor import IndexedBase, Idx +from sympy.tensor.array.expressions import ArraySymbol, ArrayElement +from sympy.utilities.lambdify import implemented_function +from sympy.testing.pytest import raises + + +def test_UnevaluatedExpr(): + p, q, r = symbols("p q r", real=True) + q_r = UnevaluatedExpr(q + r) + expr = abs(exp(p+q_r)) + assert fcode(expr, source_format="free") == "exp(p + (q + r))" + x, y, z = symbols("x y z") + y_z = UnevaluatedExpr(y + z) + expr2 = abs(exp(x+y_z)) + assert fcode(expr2, human=False)[2].lstrip() == "exp(re(x) + re(y + z))" + assert fcode(expr2, user_functions={"re": "realpart"}).lstrip() == "exp(realpart(x) + realpart(y + z))" + + +def test_printmethod(): + x = symbols('x') + + class nint(Function): + def _fcode(self, printer): + return "nint(%s)" % printer._print(self.args[0]) + assert fcode(nint(x)) == " nint(x)" + + +def test_fcode_sign(): #issue 12267 + x=symbols('x') + y=symbols('y', integer=True) + z=symbols('z', complex=True) + assert fcode(sign(x), standard=95, source_format='free') == "merge(0d0, dsign(1d0, x), x == 0d0)" + assert fcode(sign(y), standard=95, source_format='free') == "merge(0, isign(1, y), y == 0)" + assert fcode(sign(z), standard=95, source_format='free') == "merge(cmplx(0d0, 0d0), z/abs(z), abs(z) == 0d0)" + raises(NotImplementedError, lambda: fcode(sign(x))) + + +def test_fcode_Pow(): + x, y = symbols('x,y') + n = symbols('n', integer=True) + + assert fcode(x**3) == " x**3" + assert fcode(x**(y**3)) == " x**(y**3)" + assert fcode(1/(sin(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + " (3.5d0*sin(x))**(-x + y**x)/(x**2 + y)" + assert fcode(sqrt(x)) == ' sqrt(x)' + assert fcode(sqrt(n)) == ' sqrt(dble(n))' + assert fcode(x**0.5) == ' sqrt(x)' + assert fcode(sqrt(x)) == ' sqrt(x)' + assert fcode(sqrt(10)) == ' sqrt(10.0d0)' + assert fcode(x**-1.0) == ' 1d0/x' + assert fcode(x**-2.0, 'y', source_format='free') == 'y = x**(-2.0d0)' # 2823 + assert fcode(x**Rational(3, 7)) == ' x**(3.0d0/7.0d0)' + + +def test_fcode_Rational(): + x = symbols('x') + assert fcode(Rational(3, 7)) == " 3.0d0/7.0d0" + assert fcode(Rational(18, 9)) == " 2" + assert fcode(Rational(3, -7)) == " -3.0d0/7.0d0" + assert fcode(Rational(-3, -7)) == " 3.0d0/7.0d0" + assert fcode(x + Rational(3, 7)) == " x + 3.0d0/7.0d0" + assert fcode(Rational(3, 7)*x) == " (3.0d0/7.0d0)*x" + + +def test_fcode_Integer(): + assert fcode(Integer(67)) == " 67" + assert fcode(Integer(-1)) == " -1" + + +def test_fcode_Float(): + assert fcode(Float(42.0)) == " 42.0000000000000d0" + assert fcode(Float(-1e20)) == " -1.00000000000000d+20" + + +def test_fcode_functions(): + x, y = symbols('x,y') + assert fcode(sin(x) ** cos(y)) == " sin(x)**cos(y)" + raises(NotImplementedError, lambda: fcode(Mod(x, y), standard=66)) + raises(NotImplementedError, lambda: fcode(x % y, standard=66)) + raises(NotImplementedError, lambda: fcode(Mod(x, y), standard=77)) + raises(NotImplementedError, lambda: fcode(x % y, standard=77)) + for standard in [90, 95, 2003, 2008]: + assert fcode(Mod(x, y), standard=standard) == " modulo(x, y)" + assert fcode(x % y, standard=standard) == " modulo(x, y)" + + +def test_case(): + ob = FCodePrinter() + x,x_,x__,y,X,X_,Y = symbols('x,x_,x__,y,X,X_,Y') + assert fcode(exp(x_) + sin(x*y) + cos(X*Y)) == \ + ' exp(x_) + sin(x*y) + cos(X__*Y_)' + assert fcode(exp(x__) + 2*x*Y*X_**Rational(7, 2)) == \ + ' 2*X_**(7.0d0/2.0d0)*Y*x + exp(x__)' + assert fcode(exp(x_) + sin(x*y) + cos(X*Y), name_mangling=False) == \ + ' exp(x_) + sin(x*y) + cos(X*Y)' + assert fcode(x - cos(X), name_mangling=False) == ' x - cos(X)' + assert ob.doprint(X*sin(x) + x_, assign_to='me') == ' me = X*sin(x_) + x__' + assert ob.doprint(X*sin(x), assign_to='mu') == ' mu = X*sin(x_)' + assert ob.doprint(x_, assign_to='ad') == ' ad = x__' + n, m = symbols('n,m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + I = Idx('I', n) + assert fcode(A[i, I]*x[I], assign_to=y[i], source_format='free') == ( + "do i = 1, m\n" + " y(i) = 0\n" + "end do\n" + "do i = 1, m\n" + " do I_ = 1, n\n" + " y(i) = A(i, I_)*x(I_) + y(i)\n" + " end do\n" + "end do" ) + + +#issue 6814 +def test_fcode_functions_with_integers(): + x= symbols('x') + log10_17 = log(10).evalf(17) + loglog10_17 = '0.8340324452479558d0' + assert fcode(x * log(10)) == " x*%sd0" % log10_17 + assert fcode(x * log(10)) == " x*%sd0" % log10_17 + assert fcode(x * log(S(10))) == " x*%sd0" % log10_17 + assert fcode(log(S(10))) == " %sd0" % log10_17 + assert fcode(exp(10)) == " %sd0" % exp(10).evalf(17) + assert fcode(x * log(log(10))) == " x*%s" % loglog10_17 + assert fcode(x * log(log(S(10)))) == " x*%s" % loglog10_17 + + +def test_fcode_NumberSymbol(): + prec = 17 + p = FCodePrinter() + assert fcode(Catalan) == ' parameter (Catalan = %sd0)\n Catalan' % Catalan.evalf(prec) + assert fcode(EulerGamma) == ' parameter (EulerGamma = %sd0)\n EulerGamma' % EulerGamma.evalf(prec) + assert fcode(E) == ' parameter (E = %sd0)\n E' % E.evalf(prec) + assert fcode(GoldenRatio) == ' parameter (GoldenRatio = %sd0)\n GoldenRatio' % GoldenRatio.evalf(prec) + assert fcode(pi) == ' parameter (pi = %sd0)\n pi' % pi.evalf(prec) + assert fcode( + pi, precision=5) == ' parameter (pi = %sd0)\n pi' % pi.evalf(5) + assert fcode(Catalan, human=False) == ({ + (Catalan, p._print(Catalan.evalf(prec)))}, set(), ' Catalan') + assert fcode(EulerGamma, human=False) == ({(EulerGamma, p._print( + EulerGamma.evalf(prec)))}, set(), ' EulerGamma') + assert fcode(E, human=False) == ( + {(E, p._print(E.evalf(prec)))}, set(), ' E') + assert fcode(GoldenRatio, human=False) == ({(GoldenRatio, p._print( + GoldenRatio.evalf(prec)))}, set(), ' GoldenRatio') + assert fcode(pi, human=False) == ( + {(pi, p._print(pi.evalf(prec)))}, set(), ' pi') + assert fcode(pi, precision=5, human=False) == ( + {(pi, p._print(pi.evalf(5)))}, set(), ' pi') + + +def test_fcode_complex(): + assert fcode(I) == " cmplx(0,1)" + x = symbols('x') + assert fcode(4*I) == " cmplx(0,4)" + assert fcode(3 + 4*I) == " cmplx(3,4)" + assert fcode(3 + 4*I + x) == " cmplx(3,4) + x" + assert fcode(I*x) == " cmplx(0,1)*x" + assert fcode(3 + 4*I - x) == " cmplx(3,4) - x" + x = symbols('x', imaginary=True) + assert fcode(5*x) == " 5*x" + assert fcode(I*x) == " cmplx(0,1)*x" + assert fcode(3 + x) == " x + 3" + + +def test_implicit(): + x, y = symbols('x,y') + assert fcode(sin(x)) == " sin(x)" + assert fcode(atan2(x, y)) == " atan2(x, y)" + assert fcode(conjugate(x)) == " conjg(x)" + + +def test_not_fortran(): + x = symbols('x') + g = Function('g') + with raises(NotImplementedError): + fcode(gamma(x)) + assert fcode(Integral(sin(x)), strict=False) == "C Not supported in Fortran:\nC Integral\n Integral(sin(x), x)" + with raises(NotImplementedError): + fcode(g(x)) + + +def test_user_functions(): + x = symbols('x') + assert fcode(sin(x), user_functions={"sin": "zsin"}) == " zsin(x)" + x = symbols('x') + assert fcode( + gamma(x), user_functions={"gamma": "mygamma"}) == " mygamma(x)" + g = Function('g') + assert fcode(g(x), user_functions={"g": "great"}) == " great(x)" + n = symbols('n', integer=True) + assert fcode( + factorial(n), user_functions={"factorial": "fct"}) == " fct(n)" + + +def test_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert fcode(g(x)) == " 2*x" + g = implemented_function('g', Lambda(x, 2*pi/x)) + assert fcode(g(x)) == ( + " parameter (pi = %sd0)\n" + " 2*pi/x" + ) % pi.evalf(17) + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + assert fcode(g(A[i]), assign_to=A[i]) == ( + " do i = 1, n\n" + " A(i) = (A(i) + 1)*(A(i) + 2)*A(i)\n" + " end do" + ) + + +def test_assign_to(): + x = symbols('x') + assert fcode(sin(x), assign_to="s") == " s = sin(x)" + + +def test_line_wrapping(): + x, y = symbols('x,y') + assert fcode(((x + y)**10).expand(), assign_to="var") == ( + " var = x**10 + 10*x**9*y + 45*x**8*y**2 + 120*x**7*y**3 + 210*x**6*\n" + " @ y**4 + 252*x**5*y**5 + 210*x**4*y**6 + 120*x**3*y**7 + 45*x**2*y\n" + " @ **8 + 10*x*y**9 + y**10" + ) + e = [x**i for i in range(11)] + assert fcode(Add(*e)) == ( + " x**10 + x**9 + x**8 + x**7 + x**6 + x**5 + x**4 + x**3 + x**2 + x\n" + " @ + 1" + ) + + +def test_fcode_precedence(): + x, y = symbols("x y") + assert fcode(And(x < y, y < x + 1), source_format="free") == \ + "x < y .and. y < x + 1" + assert fcode(Or(x < y, y < x + 1), source_format="free") == \ + "x < y .or. y < x + 1" + assert fcode(Xor(x < y, y < x + 1, evaluate=False), + source_format="free") == "x < y .neqv. y < x + 1" + assert fcode(Equivalent(x < y, y < x + 1), source_format="free") == \ + "x < y .eqv. y < x + 1" + + +def test_fcode_Logical(): + x, y, z = symbols("x y z") + # unary Not + assert fcode(Not(x), source_format="free") == ".not. x" + # binary And + assert fcode(And(x, y), source_format="free") == "x .and. y" + assert fcode(And(x, Not(y)), source_format="free") == "x .and. .not. y" + assert fcode(And(Not(x), y), source_format="free") == "y .and. .not. x" + assert fcode(And(Not(x), Not(y)), source_format="free") == \ + ".not. x .and. .not. y" + assert fcode(Not(And(x, y), evaluate=False), source_format="free") == \ + ".not. (x .and. y)" + # binary Or + assert fcode(Or(x, y), source_format="free") == "x .or. y" + assert fcode(Or(x, Not(y)), source_format="free") == "x .or. .not. y" + assert fcode(Or(Not(x), y), source_format="free") == "y .or. .not. x" + assert fcode(Or(Not(x), Not(y)), source_format="free") == \ + ".not. x .or. .not. y" + assert fcode(Not(Or(x, y), evaluate=False), source_format="free") == \ + ".not. (x .or. y)" + # mixed And/Or + assert fcode(And(Or(y, z), x), source_format="free") == "x .and. (y .or. z)" + assert fcode(And(Or(z, x), y), source_format="free") == "y .and. (x .or. z)" + assert fcode(And(Or(x, y), z), source_format="free") == "z .and. (x .or. y)" + assert fcode(Or(And(y, z), x), source_format="free") == "x .or. y .and. z" + assert fcode(Or(And(z, x), y), source_format="free") == "y .or. x .and. z" + assert fcode(Or(And(x, y), z), source_format="free") == "z .or. x .and. y" + # trinary And + assert fcode(And(x, y, z), source_format="free") == "x .and. y .and. z" + assert fcode(And(x, y, Not(z)), source_format="free") == \ + "x .and. y .and. .not. z" + assert fcode(And(x, Not(y), z), source_format="free") == \ + "x .and. z .and. .not. y" + assert fcode(And(Not(x), y, z), source_format="free") == \ + "y .and. z .and. .not. x" + assert fcode(Not(And(x, y, z), evaluate=False), source_format="free") == \ + ".not. (x .and. y .and. z)" + # trinary Or + assert fcode(Or(x, y, z), source_format="free") == "x .or. y .or. z" + assert fcode(Or(x, y, Not(z)), source_format="free") == \ + "x .or. y .or. .not. z" + assert fcode(Or(x, Not(y), z), source_format="free") == \ + "x .or. z .or. .not. y" + assert fcode(Or(Not(x), y, z), source_format="free") == \ + "y .or. z .or. .not. x" + assert fcode(Not(Or(x, y, z), evaluate=False), source_format="free") == \ + ".not. (x .or. y .or. z)" + + +def test_fcode_Xlogical(): + x, y, z = symbols("x y z") + # binary Xor + assert fcode(Xor(x, y, evaluate=False), source_format="free") == \ + "x .neqv. y" + assert fcode(Xor(x, Not(y), evaluate=False), source_format="free") == \ + "x .neqv. .not. y" + assert fcode(Xor(Not(x), y, evaluate=False), source_format="free") == \ + "y .neqv. .not. x" + assert fcode(Xor(Not(x), Not(y), evaluate=False), + source_format="free") == ".not. x .neqv. .not. y" + assert fcode(Not(Xor(x, y, evaluate=False), evaluate=False), + source_format="free") == ".not. (x .neqv. y)" + # binary Equivalent + assert fcode(Equivalent(x, y), source_format="free") == "x .eqv. y" + assert fcode(Equivalent(x, Not(y)), source_format="free") == \ + "x .eqv. .not. y" + assert fcode(Equivalent(Not(x), y), source_format="free") == \ + "y .eqv. .not. x" + assert fcode(Equivalent(Not(x), Not(y)), source_format="free") == \ + ".not. x .eqv. .not. y" + assert fcode(Not(Equivalent(x, y), evaluate=False), + source_format="free") == ".not. (x .eqv. y)" + # mixed And/Equivalent + assert fcode(Equivalent(And(y, z), x), source_format="free") == \ + "x .eqv. y .and. z" + assert fcode(Equivalent(And(z, x), y), source_format="free") == \ + "y .eqv. x .and. z" + assert fcode(Equivalent(And(x, y), z), source_format="free") == \ + "z .eqv. x .and. y" + assert fcode(And(Equivalent(y, z), x), source_format="free") == \ + "x .and. (y .eqv. z)" + assert fcode(And(Equivalent(z, x), y), source_format="free") == \ + "y .and. (x .eqv. z)" + assert fcode(And(Equivalent(x, y), z), source_format="free") == \ + "z .and. (x .eqv. y)" + # mixed Or/Equivalent + assert fcode(Equivalent(Or(y, z), x), source_format="free") == \ + "x .eqv. y .or. z" + assert fcode(Equivalent(Or(z, x), y), source_format="free") == \ + "y .eqv. x .or. z" + assert fcode(Equivalent(Or(x, y), z), source_format="free") == \ + "z .eqv. x .or. y" + assert fcode(Or(Equivalent(y, z), x), source_format="free") == \ + "x .or. (y .eqv. z)" + assert fcode(Or(Equivalent(z, x), y), source_format="free") == \ + "y .or. (x .eqv. z)" + assert fcode(Or(Equivalent(x, y), z), source_format="free") == \ + "z .or. (x .eqv. y)" + # mixed Xor/Equivalent + assert fcode(Equivalent(Xor(y, z, evaluate=False), x), + source_format="free") == "x .eqv. (y .neqv. z)" + assert fcode(Equivalent(Xor(z, x, evaluate=False), y), + source_format="free") == "y .eqv. (x .neqv. z)" + assert fcode(Equivalent(Xor(x, y, evaluate=False), z), + source_format="free") == "z .eqv. (x .neqv. y)" + assert fcode(Xor(Equivalent(y, z), x, evaluate=False), + source_format="free") == "x .neqv. (y .eqv. z)" + assert fcode(Xor(Equivalent(z, x), y, evaluate=False), + source_format="free") == "y .neqv. (x .eqv. z)" + assert fcode(Xor(Equivalent(x, y), z, evaluate=False), + source_format="free") == "z .neqv. (x .eqv. y)" + # mixed And/Xor + assert fcode(Xor(And(y, z), x, evaluate=False), source_format="free") == \ + "x .neqv. y .and. z" + assert fcode(Xor(And(z, x), y, evaluate=False), source_format="free") == \ + "y .neqv. x .and. z" + assert fcode(Xor(And(x, y), z, evaluate=False), source_format="free") == \ + "z .neqv. x .and. y" + assert fcode(And(Xor(y, z, evaluate=False), x), source_format="free") == \ + "x .and. (y .neqv. z)" + assert fcode(And(Xor(z, x, evaluate=False), y), source_format="free") == \ + "y .and. (x .neqv. z)" + assert fcode(And(Xor(x, y, evaluate=False), z), source_format="free") == \ + "z .and. (x .neqv. y)" + # mixed Or/Xor + assert fcode(Xor(Or(y, z), x, evaluate=False), source_format="free") == \ + "x .neqv. y .or. z" + assert fcode(Xor(Or(z, x), y, evaluate=False), source_format="free") == \ + "y .neqv. x .or. z" + assert fcode(Xor(Or(x, y), z, evaluate=False), source_format="free") == \ + "z .neqv. x .or. y" + assert fcode(Or(Xor(y, z, evaluate=False), x), source_format="free") == \ + "x .or. (y .neqv. z)" + assert fcode(Or(Xor(z, x, evaluate=False), y), source_format="free") == \ + "y .or. (x .neqv. z)" + assert fcode(Or(Xor(x, y, evaluate=False), z), source_format="free") == \ + "z .or. (x .neqv. y)" + # trinary Xor + assert fcode(Xor(x, y, z, evaluate=False), source_format="free") == \ + "x .neqv. y .neqv. z" + assert fcode(Xor(x, y, Not(z), evaluate=False), source_format="free") == \ + "x .neqv. y .neqv. .not. z" + assert fcode(Xor(x, Not(y), z, evaluate=False), source_format="free") == \ + "x .neqv. z .neqv. .not. y" + assert fcode(Xor(Not(x), y, z, evaluate=False), source_format="free") == \ + "y .neqv. z .neqv. .not. x" + + +def test_fcode_Relational(): + x, y = symbols("x y") + assert fcode(Relational(x, y, "=="), source_format="free") == "x == y" + assert fcode(Relational(x, y, "!="), source_format="free") == "x /= y" + assert fcode(Relational(x, y, ">="), source_format="free") == "x >= y" + assert fcode(Relational(x, y, "<="), source_format="free") == "x <= y" + assert fcode(Relational(x, y, ">"), source_format="free") == "x > y" + assert fcode(Relational(x, y, "<"), source_format="free") == "x < y" + + +def test_fcode_Piecewise(): + x = symbols('x') + expr = Piecewise((x, x < 1), (x**2, True)) + # Check that inline conditional (merge) fails if standard isn't 95+ + raises(NotImplementedError, lambda: fcode(expr)) + code = fcode(expr, standard=95) + expected = " merge(x, x**2, x < 1)" + assert code == expected + assert fcode(Piecewise((x, x < 1), (x**2, True)), assign_to="var") == ( + " if (x < 1) then\n" + " var = x\n" + " else\n" + " var = x**2\n" + " end if" + ) + a = cos(x)/x + b = sin(x)/x + for i in range(10): + a = diff(a, x) + b = diff(b, x) + expected = ( + " if (x < 0) then\n" + " weird_name = -cos(x)/x + 10*sin(x)/x**2 + 90*cos(x)/x**3 - 720*\n" + " @ sin(x)/x**4 - 5040*cos(x)/x**5 + 30240*sin(x)/x**6 + 151200*cos(x\n" + " @ )/x**7 - 604800*sin(x)/x**8 - 1814400*cos(x)/x**9 + 3628800*sin(x\n" + " @ )/x**10 + 3628800*cos(x)/x**11\n" + " else\n" + " weird_name = -sin(x)/x - 10*cos(x)/x**2 + 90*sin(x)/x**3 + 720*\n" + " @ cos(x)/x**4 - 5040*sin(x)/x**5 - 30240*cos(x)/x**6 + 151200*sin(x\n" + " @ )/x**7 + 604800*cos(x)/x**8 - 1814400*sin(x)/x**9 - 3628800*cos(x\n" + " @ )/x**10 + 3628800*sin(x)/x**11\n" + " end if" + ) + code = fcode(Piecewise((a, x < 0), (b, True)), assign_to="weird_name") + assert code == expected + code = fcode(Piecewise((x, x < 1), (x**2, x > 1), (sin(x), True)), standard=95) + expected = " merge(x, merge(x**2, sin(x), x > 1), x < 1)" + assert code == expected + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: fcode(expr)) + + +def test_wrap_fortran(): + # "########################################################################" + printer = FCodePrinter() + lines = [ + "C This is a long comment on a single line that must be wrapped properly to produce nice output", + " this = is + a + long + and + nasty + fortran + statement + that * must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that * must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that * must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement(that)/must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement(that)/must + be + wrapped + properly", + ] + wrapped_lines = printer._wrap_fortran(lines) + expected_lines = [ + "C This is a long comment on a single line that must be wrapped", + "C properly to produce nice output", + " this = is + a + long + and + nasty + fortran + statement + that *", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that *", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that", + " @ * must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that*", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that", + " @ *must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement +", + " @ that*must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that**", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that", + " @ **must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement + that", + " @ **must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement +", + " @ that**must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement(that)/", + " @ must + be + wrapped + properly", + " this = is + a + long + and + nasty + fortran + statement(that)", + " @ /must + be + wrapped + properly", + ] + for line in wrapped_lines: + assert len(line) <= 72 + for w, e in zip(wrapped_lines, expected_lines): + assert w == e + assert len(wrapped_lines) == len(expected_lines) + + +def test_wrap_fortran_keep_d0(): + printer = FCodePrinter() + lines = [ + ' this_variable_is_very_long_because_we_try_to_test_line_break=1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break = 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break = 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break = 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break = 10.0d0' + ] + expected = [ + ' this_variable_is_very_long_because_we_try_to_test_line_break=1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =', + ' @ 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =', + ' @ 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =', + ' @ 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =', + ' @ 1.0d0', + ' this_variable_is_very_long_because_we_try_to_test_line_break =', + ' @ 10.0d0' + ] + assert printer._wrap_fortran(lines) == expected + + +def test_settings(): + raises(TypeError, lambda: fcode(S(4), method="garbage")) + + +def test_free_form_code_line(): + x, y = symbols('x,y') + assert fcode(cos(x) + sin(y), source_format='free') == "sin(y) + cos(x)" + + +def test_free_form_continuation_line(): + x, y = symbols('x,y') + result = fcode(((cos(x) + sin(y))**(7)).expand(), source_format='free') + expected = ( + 'sin(y)**7 + 7*sin(y)**6*cos(x) + 21*sin(y)**5*cos(x)**2 + 35*sin(y)**4* &\n' + ' cos(x)**3 + 35*sin(y)**3*cos(x)**4 + 21*sin(y)**2*cos(x)**5 + 7* &\n' + ' sin(y)*cos(x)**6 + cos(x)**7' + ) + assert result == expected + + +def test_free_form_comment_line(): + printer = FCodePrinter({'source_format': 'free'}) + lines = [ "! This is a long comment on a single line that must be wrapped properly to produce nice output"] + expected = [ + '! This is a long comment on a single line that must be wrapped properly', + '! to produce nice output'] + assert printer._wrap_fortran(lines) == expected + + +def test_loops(): + n, m = symbols('n,m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + + expected = ( + 'do i = 1, m\n' + ' y(i) = 0\n' + 'end do\n' + 'do i = 1, m\n' + ' do j = 1, n\n' + ' y(i) = %(rhs)s\n' + ' end do\n' + 'end do' + ) + + code = fcode(A[i, j]*x[j], assign_to=y[i], source_format='free') + assert (code == expected % {'rhs': 'y(i) + A(i, j)*x(j)'} or + code == expected % {'rhs': 'y(i) + x(j)*A(i, j)'} or + code == expected % {'rhs': 'x(j)*A(i, j) + y(i)'} or + code == expected % {'rhs': 'A(i, j)*x(j) + y(i)'}) + + +def test_dummy_loops(): + i, m = symbols('i m', integer=True, cls=Dummy) + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx(i, m) + + expected = ( + 'do i_%(icount)i = 1, m_%(mcount)i\n' + ' y(i_%(icount)i) = x(i_%(icount)i)\n' + 'end do' + ) % {'icount': i.label.dummy_index, 'mcount': m.dummy_index} + code = fcode(x[i], assign_to=y[i], source_format='free') + assert code == expected + + +def test_fcode_Indexed_without_looking_for_contraction(): + len_y = 5 + y = IndexedBase('y', shape=(len_y,)) + x = IndexedBase('x', shape=(len_y,)) + Dy = IndexedBase('Dy', shape=(len_y-1,)) + i = Idx('i', len_y-1) + e=Eq(Dy[i], (y[i+1]-y[i])/(x[i+1]-x[i])) + code0 = fcode(e.rhs, assign_to=e.lhs, contract=False) + assert code0.endswith('Dy(i) = (y(i + 1) - y(i))/(x(i + 1) - x(i))') + + +def test_element_like_objects(): + len_y = 5 + y = ArraySymbol('y', shape=(len_y,)) + x = ArraySymbol('x', shape=(len_y,)) + Dy = ArraySymbol('Dy', shape=(len_y-1,)) + i = Idx('i', len_y-1) + e=Eq(Dy[i], (y[i+1]-y[i])/(x[i+1]-x[i])) + code0 = fcode(Assignment(e.lhs, e.rhs)) + assert code0.endswith('Dy(i) = (y(i + 1) - y(i))/(x(i + 1) - x(i))') + + class ElementExpr(Element, Expr): + pass + + e = e.subs((a, ElementExpr(a.name, a.indices)) for a in e.atoms(ArrayElement) ) + e=Eq(Dy[i], (y[i+1]-y[i])/(x[i+1]-x[i])) + code0 = fcode(Assignment(e.lhs, e.rhs)) + assert code0.endswith('Dy(i) = (y(i + 1) - y(i))/(x(i + 1) - x(i))') + + +def test_derived_classes(): + class MyFancyFCodePrinter(FCodePrinter): + _default_settings = FCodePrinter._default_settings.copy() + + printer = MyFancyFCodePrinter() + x = symbols('x') + assert printer.doprint(sin(x), "bork") == " bork = sin(x)" + + +def test_indent(): + codelines = ( + 'subroutine test(a)\n' + 'integer :: a, i, j\n' + '\n' + 'do\n' + 'do \n' + 'do j = 1, 5\n' + 'if (a>b) then\n' + 'if(b>0) then\n' + 'a = 3\n' + 'donot_indent_me = 2\n' + 'do_not_indent_me_either = 2\n' + 'ifIam_indented_something_went_wrong = 2\n' + 'if_I_am_indented_something_went_wrong = 2\n' + 'end should not be unindented here\n' + 'end if\n' + 'endif\n' + 'end do\n' + 'end do\n' + 'enddo\n' + 'end subroutine\n' + '\n' + 'subroutine test2(a)\n' + 'integer :: a\n' + 'do\n' + 'a = a + 1\n' + 'end do \n' + 'end subroutine\n' + ) + expected = ( + 'subroutine test(a)\n' + 'integer :: a, i, j\n' + '\n' + 'do\n' + ' do \n' + ' do j = 1, 5\n' + ' if (a>b) then\n' + ' if(b>0) then\n' + ' a = 3\n' + ' donot_indent_me = 2\n' + ' do_not_indent_me_either = 2\n' + ' ifIam_indented_something_went_wrong = 2\n' + ' if_I_am_indented_something_went_wrong = 2\n' + ' end should not be unindented here\n' + ' end if\n' + ' endif\n' + ' end do\n' + ' end do\n' + 'enddo\n' + 'end subroutine\n' + '\n' + 'subroutine test2(a)\n' + 'integer :: a\n' + 'do\n' + ' a = a + 1\n' + 'end do \n' + 'end subroutine\n' + ) + p = FCodePrinter({'source_format': 'free'}) + result = p.indent_code(codelines) + assert result == expected + +def test_Matrix_printing(): + x, y, z = symbols('x,y,z') + # Test returning a Matrix + mat = Matrix([x*y, Piecewise((2 + x, y>0), (y, True)), sin(z)]) + A = MatrixSymbol('A', 3, 1) + assert fcode(mat, A) == ( + " A(1, 1) = x*y\n" + " if (y > 0) then\n" + " A(2, 1) = x + 2\n" + " else\n" + " A(2, 1) = y\n" + " end if\n" + " A(3, 1) = sin(z)") + # Test using MatrixElements in expressions + expr = Piecewise((2*A[2, 0], x > 0), (A[2, 0], True)) + sin(A[1, 0]) + A[0, 0] + assert fcode(expr, standard=95) == ( + " merge(2*A(3, 1), A(3, 1), x > 0) + sin(A(2, 1)) + A(1, 1)") + # Test using MatrixElements in a Matrix + q = MatrixSymbol('q', 5, 1) + M = MatrixSymbol('M', 3, 3) + m = Matrix([[sin(q[1,0]), 0, cos(q[2,0])], + [q[1,0] + q[2,0], q[3, 0], 5], + [2*q[4, 0]/q[1,0], sqrt(q[0,0]) + 4, 0]]) + assert fcode(m, M) == ( + " M(1, 1) = sin(q(2, 1))\n" + " M(2, 1) = q(2, 1) + q(3, 1)\n" + " M(3, 1) = 2*q(5, 1)/q(2, 1)\n" + " M(1, 2) = 0\n" + " M(2, 2) = q(4, 1)\n" + " M(3, 2) = sqrt(q(1, 1)) + 4\n" + " M(1, 3) = cos(q(3, 1))\n" + " M(2, 3) = 5\n" + " M(3, 3) = 0") + + +def test_fcode_For(): + x, y = symbols('x y') + + f = For(x, Range(0, 10, 2), [Assignment(y, x * y)]) + sol = fcode(f) + assert sol == (" do x = 0, 9, 2\n" + " y = x*y\n" + " end do") + + +def test_fcode_Declaration(): + def check(expr, ref, **kwargs): + assert fcode(expr, standard=95, source_format='free', **kwargs) == ref + + i = symbols('i', integer=True) + var1 = Variable.deduced(i) + dcl1 = Declaration(var1) + check(dcl1, "integer*4 :: i") + + + x, y = symbols('x y') + var2 = Variable(x, float32, value=42, attrs={value_const}) + dcl2b = Declaration(var2) + check(dcl2b, 'real*4, parameter :: x = 42') + + var3 = Variable(y, type=bool_) + dcl3 = Declaration(var3) + check(dcl3, 'logical :: y') + + check(float32, "real*4") + check(float64, "real*8") + check(real, "real*4", type_aliases={real: float32}) + check(real, "real*8", type_aliases={real: float64}) + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(fcode(A[0, 0]) == " A(1, 1)") + assert(fcode(3 * A[0, 0]) == " 3*A(1, 1)") + + F = C[0, 0].subs(C, A - B) + assert(fcode(F) == " (A - B)(1, 1)") + + +def test_aug_assign(): + x = symbols('x') + assert fcode(aug_assign(x, '+', 1), source_format='free') == 'x = x + 1' + + +def test_While(): + x = symbols('x') + assert fcode(While(abs(x) > 1, [aug_assign(x, '-', 1)]), source_format='free') == ( + 'do while (abs(x) > 1)\n' + ' x = x - 1\n' + 'end do' + ) + + +def test_FunctionPrototype_print(): + x = symbols('x') + n = symbols('n', integer=True) + vx = Variable(x, type=real) + vn = Variable(n, type=integer) + fp1 = FunctionPrototype(real, 'power', [vx, vn]) + # Should be changed to proper test once multi-line generation is working + # see https://github.com/sympy/sympy/issues/15824 + raises(NotImplementedError, lambda: fcode(fp1)) + + +def test_FunctionDefinition_print(): + x = symbols('x') + n = symbols('n', integer=True) + vx = Variable(x, type=real) + vn = Variable(n, type=integer) + body = [Assignment(x, x**n), Return(x)] + fd1 = FunctionDefinition(real, 'power', [vx, vn], body) + # Should be changed to proper test once multi-line generation is working + # see https://github.com/sympy/sympy/issues/15824 + raises(NotImplementedError, lambda: fcode(fd1)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_glsl.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_glsl.py new file mode 100644 index 0000000000000000000000000000000000000000..86ec1dfe4a37d141e8435c369cb692d3a9a3b7bc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_glsl.py @@ -0,0 +1,998 @@ +from sympy.core import (pi, symbols, Rational, Integer, GoldenRatio, EulerGamma, + Catalan, Lambda, Dummy, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.functions import Piecewise, sin, cos, Abs, exp, ceiling, sqrt +from sympy.testing.pytest import raises, warns_deprecated_sympy +from sympy.printing.glsl import GLSLPrinter +from sympy.printing.str import StrPrinter +from sympy.utilities.lambdify import implemented_function +from sympy.tensor import IndexedBase, Idx +from sympy.matrices import Matrix, MatrixSymbol +from sympy.core import Tuple +from sympy.printing.glsl import glsl_code +import textwrap + +x, y, z = symbols('x,y,z') + + +def test_printmethod(): + assert glsl_code(Abs(x)) == "abs(x)" + +def test_print_without_operators(): + assert glsl_code(x*y,use_operators = False) == 'mul(x, y)' + assert glsl_code(x**y+z,use_operators = False) == 'add(pow(x, y), z)' + assert glsl_code(x*(y+z),use_operators = False) == 'mul(x, add(y, z))' + assert glsl_code(x*(y+z),use_operators = False) == 'mul(x, add(y, z))' + assert glsl_code(x*(y+z**y**0.5),use_operators = False) == 'mul(x, add(y, pow(z, sqrt(y))))' + assert glsl_code(-x-y, use_operators=False, zero='zero()') == 'sub(zero(), add(x, y))' + assert glsl_code(-x-y, use_operators=False) == 'sub(0.0, add(x, y))' + +def test_glsl_code_sqrt(): + assert glsl_code(sqrt(x)) == "sqrt(x)" + assert glsl_code(x**0.5) == "sqrt(x)" + assert glsl_code(sqrt(x)) == "sqrt(x)" + + +def test_glsl_code_Pow(): + g = implemented_function('g', Lambda(x, 2*x)) + assert glsl_code(x**3) == "pow(x, 3.0)" + assert glsl_code(x**(y**3)) == "pow(x, pow(y, 3.0))" + assert glsl_code(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "pow(3.5*2*x, -x + pow(y, x))/(pow(x, 2.0) + y)" + assert glsl_code(x**-1.0) == '1.0/x' + + +def test_glsl_code_Relational(): + assert glsl_code(Eq(x, y)) == "x == y" + assert glsl_code(Ne(x, y)) == "x != y" + assert glsl_code(Le(x, y)) == "x <= y" + assert glsl_code(Lt(x, y)) == "x < y" + assert glsl_code(Gt(x, y)) == "x > y" + assert glsl_code(Ge(x, y)) == "x >= y" + + +def test_glsl_code_constants_mathh(): + assert glsl_code(exp(1)) == "float E = 2.71828183;\nE" + assert glsl_code(pi) == "float pi = 3.14159265;\npi" + # assert glsl_code(oo) == "Number.POSITIVE_INFINITY" + # assert glsl_code(-oo) == "Number.NEGATIVE_INFINITY" + + +def test_glsl_code_constants_other(): + assert glsl_code(2*GoldenRatio) == "float GoldenRatio = 1.61803399;\n2*GoldenRatio" + assert glsl_code(2*Catalan) == "float Catalan = 0.915965594;\n2*Catalan" + assert glsl_code(2*EulerGamma) == "float EulerGamma = 0.577215665;\n2*EulerGamma" + + +def test_glsl_code_Rational(): + assert glsl_code(Rational(3, 7)) == "3.0/7.0" + assert glsl_code(Rational(18, 9)) == "2" + assert glsl_code(Rational(3, -7)) == "-3.0/7.0" + assert glsl_code(Rational(-3, -7)) == "3.0/7.0" + + +def test_glsl_code_Integer(): + assert glsl_code(Integer(67)) == "67" + assert glsl_code(Integer(-1)) == "-1" + + +def test_glsl_code_functions(): + assert glsl_code(sin(x) ** cos(x)) == "pow(sin(x), cos(x))" + + +def test_glsl_code_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert glsl_code(g(x)) == "2*x" + g = implemented_function('g', Lambda(x, 2*x/Catalan)) + assert glsl_code(g(x)) == "float Catalan = 0.915965594;\n2*x/Catalan" + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + assert glsl_code(g(A[i]), assign_to=A[i]) == ( + "for (int i=0; i 1), (sin(x), x > 0)) + raises(ValueError, lambda: glsl_code(expr)) + + +def test_glsl_code_Piecewise_deep(): + p = glsl_code(2*Piecewise((x, x < 1), (x**2, True))) + s = \ +"""\ +2*((x < 1) ? ( + x +) +: ( + pow(x, 2.0) +))\ +""" + assert p == s + + +def test_glsl_code_settings(): + raises(TypeError, lambda: glsl_code(sin(x), method="garbage")) + + +def test_glsl_code_Indexed(): + n, m, o = symbols('n m o', integer=True) + i, j, k = Idx('i', n), Idx('j', m), Idx('k', o) + p = GLSLPrinter() + p._not_c = set() + + x = IndexedBase('x')[j] + assert p._print_Indexed(x) == 'x[j]' + A = IndexedBase('A')[i, j] + assert p._print_Indexed(A) == 'A[%s]' % (m*i+j) + B = IndexedBase('B')[i, j, k] + assert p._print_Indexed(B) == 'B[%s]' % (i*o*m+j*o+k) + + assert p._not_c == set() + +def test_glsl_code_list_tuple_Tuple(): + assert glsl_code([1,2,3,4]) == 'vec4(1, 2, 3, 4)' + assert glsl_code([1,2,3],glsl_types=False) == 'float[3](1, 2, 3)' + assert glsl_code([1,2,3]) == glsl_code((1,2,3)) + assert glsl_code([1,2,3]) == glsl_code(Tuple(1,2,3)) + + m = MatrixSymbol('A',3,4) + assert glsl_code([m[0],m[1]]) + +def test_glsl_code_loops_matrix_vector(): + n, m = symbols('n m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + + s = ( + 'for (int i=0; i0), (y, True)), sin(z)]) + A = MatrixSymbol('A', 3, 1) + assert glsl_code(mat, assign_to=A) == ( +'''A[0][0] = x*y; +if (y > 0) { + A[1][0] = x + 2; +} +else { + A[1][0] = y; +} +A[2][0] = sin(z);''' ) + assert glsl_code(Matrix([A[0],A[1]])) + # Test using MatrixElements in expressions + expr = Piecewise((2*A[2, 0], x > 0), (A[2, 0], True)) + sin(A[1, 0]) + A[0, 0] + assert glsl_code(expr) == ( +'''((x > 0) ? ( + 2*A[2][0] +) +: ( + A[2][0] +)) + sin(A[1][0]) + A[0][0]''' ) + + # Test using MatrixElements in a Matrix + q = MatrixSymbol('q', 5, 1) + M = MatrixSymbol('M', 3, 3) + m = Matrix([[sin(q[1,0]), 0, cos(q[2,0])], + [q[1,0] + q[2,0], q[3, 0], 5], + [2*q[4, 0]/q[1,0], sqrt(q[0,0]) + 4, 0]]) + assert glsl_code(m,M) == ( +'''M[0][0] = sin(q[1]); +M[0][1] = 0; +M[0][2] = cos(q[2]); +M[1][0] = q[1] + q[2]; +M[1][1] = q[3]; +M[1][2] = 5; +M[2][0] = 2*q[4]/q[1]; +M[2][1] = sqrt(q[0]) + 4; +M[2][2] = 0;''' + ) + +def test_Matrices_1x7(): + gl = glsl_code + A = Matrix([1,2,3,4,5,6,7]) + assert gl(A) == 'float[7](1, 2, 3, 4, 5, 6, 7)' + assert gl(A.transpose()) == 'float[7](1, 2, 3, 4, 5, 6, 7)' + +def test_Matrices_1x7_array_type_int(): + gl = glsl_code + A = Matrix([1,2,3,4,5,6,7]) + assert gl(A, array_type='int') == 'int[7](1, 2, 3, 4, 5, 6, 7)' + +def test_Tuple_array_type_custom(): + gl = glsl_code + A = symbols('a b c') + assert gl(A, array_type='AbcType', glsl_types=False) == 'AbcType[3](a, b, c)' + +def test_Matrices_1x7_spread_assign_to_symbols(): + gl = glsl_code + A = Matrix([1,2,3,4,5,6,7]) + assign_to = symbols('x.a x.b x.c x.d x.e x.f x.g') + assert gl(A, assign_to=assign_to) == textwrap.dedent('''\ + x.a = 1; + x.b = 2; + x.c = 3; + x.d = 4; + x.e = 5; + x.f = 6; + x.g = 7;''' + ) + +def test_spread_assign_to_nested_symbols(): + gl = glsl_code + expr = ((1,2,3), (1,2,3)) + assign_to = (symbols('a b c'), symbols('x y z')) + assert gl(expr, assign_to=assign_to) == textwrap.dedent('''\ + a = 1; + b = 2; + c = 3; + x = 1; + y = 2; + z = 3;''' + ) + +def test_spread_assign_to_deeply_nested_symbols(): + gl = glsl_code + a, b, c, x, y, z = symbols('a b c x y z') + expr = (((1,2),3), ((1,2),3)) + assign_to = (((a, b), c), ((x, y), z)) + assert gl(expr, assign_to=assign_to) == textwrap.dedent('''\ + a = 1; + b = 2; + c = 3; + x = 1; + y = 2; + z = 3;''' + ) + +def test_matrix_of_tuples_spread_assign_to_symbols(): + gl = glsl_code + with warns_deprecated_sympy(): + expr = Matrix([[(1,2),(3,4)],[(5,6),(7,8)]]) + assign_to = (symbols('a b'), symbols('c d'), symbols('e f'), symbols('g h')) + assert gl(expr, assign_to) == textwrap.dedent('''\ + a = 1; + b = 2; + c = 3; + d = 4; + e = 5; + f = 6; + g = 7; + h = 8;''' + ) + +def test_cannot_assign_to_cause_mismatched_length(): + expr = (1, 2) + assign_to = symbols('x y z') + raises(ValueError, lambda: glsl_code(expr, assign_to)) + +def test_matrix_4x4_assign(): + gl = glsl_code + expr = MatrixSymbol('A',4,4) * MatrixSymbol('B',4,4) + MatrixSymbol('C',4,4) + assign_to = MatrixSymbol('X',4,4) + assert gl(expr, assign_to=assign_to) == textwrap.dedent('''\ + X[0][0] = A[0][0]*B[0][0] + A[0][1]*B[1][0] + A[0][2]*B[2][0] + A[0][3]*B[3][0] + C[0][0]; + X[0][1] = A[0][0]*B[0][1] + A[0][1]*B[1][1] + A[0][2]*B[2][1] + A[0][3]*B[3][1] + C[0][1]; + X[0][2] = A[0][0]*B[0][2] + A[0][1]*B[1][2] + A[0][2]*B[2][2] + A[0][3]*B[3][2] + C[0][2]; + X[0][3] = A[0][0]*B[0][3] + A[0][1]*B[1][3] + A[0][2]*B[2][3] + A[0][3]*B[3][3] + C[0][3]; + X[1][0] = A[1][0]*B[0][0] + A[1][1]*B[1][0] + A[1][2]*B[2][0] + A[1][3]*B[3][0] + C[1][0]; + X[1][1] = A[1][0]*B[0][1] + A[1][1]*B[1][1] + A[1][2]*B[2][1] + A[1][3]*B[3][1] + C[1][1]; + X[1][2] = A[1][0]*B[0][2] + A[1][1]*B[1][2] + A[1][2]*B[2][2] + A[1][3]*B[3][2] + C[1][2]; + X[1][3] = A[1][0]*B[0][3] + A[1][1]*B[1][3] + A[1][2]*B[2][3] + A[1][3]*B[3][3] + C[1][3]; + X[2][0] = A[2][0]*B[0][0] + A[2][1]*B[1][0] + A[2][2]*B[2][0] + A[2][3]*B[3][0] + C[2][0]; + X[2][1] = A[2][0]*B[0][1] + A[2][1]*B[1][1] + A[2][2]*B[2][1] + A[2][3]*B[3][1] + C[2][1]; + X[2][2] = A[2][0]*B[0][2] + A[2][1]*B[1][2] + A[2][2]*B[2][2] + A[2][3]*B[3][2] + C[2][2]; + X[2][3] = A[2][0]*B[0][3] + A[2][1]*B[1][3] + A[2][2]*B[2][3] + A[2][3]*B[3][3] + C[2][3]; + X[3][0] = A[3][0]*B[0][0] + A[3][1]*B[1][0] + A[3][2]*B[2][0] + A[3][3]*B[3][0] + C[3][0]; + X[3][1] = A[3][0]*B[0][1] + A[3][1]*B[1][1] + A[3][2]*B[2][1] + A[3][3]*B[3][1] + C[3][1]; + X[3][2] = A[3][0]*B[0][2] + A[3][1]*B[1][2] + A[3][2]*B[2][2] + A[3][3]*B[3][2] + C[3][2]; + X[3][3] = A[3][0]*B[0][3] + A[3][1]*B[1][3] + A[3][2]*B[2][3] + A[3][3]*B[3][3] + C[3][3];''' + ) + +def test_1xN_vecs(): + gl = glsl_code + for i in range(1,10): + A = Matrix(range(i)) + assert gl(A.transpose()) == gl(A) + assert gl(A,mat_transpose=True) == gl(A) + if i > 1: + if i <= 4: + assert gl(A) == 'vec%s(%s)' % (i,', '.join(str(s) for s in range(i))) + else: + assert gl(A) == 'float[%s](%s)' % (i,', '.join(str(s) for s in range(i))) + +def test_MxN_mats(): + generatedAssertions='def test_misc_mats():\n' + for i in range(1,6): + for j in range(1,6): + A = Matrix([[x + y*j for x in range(j)] for y in range(i)]) + gl = glsl_code(A) + glTransposed = glsl_code(A,mat_transpose=True) + generatedAssertions+=' mat = '+StrPrinter()._print(A)+'\n\n' + generatedAssertions+=' gl = \'\'\''+gl+'\'\'\'\n' + generatedAssertions+=' glTransposed = \'\'\''+glTransposed+'\'\'\'\n\n' + generatedAssertions+=' assert glsl_code(mat) == gl\n' + generatedAssertions+=' assert glsl_code(mat,mat_transpose=True) == glTransposed\n' + if i == 1 and j == 1: + assert gl == '0' + elif i <= 4 and j <= 4 and i>1 and j>1: + assert gl.startswith('mat%s' % j) + assert glTransposed.startswith('mat%s' % i) + elif i == 1 and j <= 4: + assert gl.startswith('vec') + elif j == 1 and i <= 4: + assert gl.startswith('vec') + elif i == 1: + assert gl.startswith('float[%s]('% j*i) + assert glTransposed.startswith('float[%s]('% j*i) + elif j == 1: + assert gl.startswith('float[%s]('% i*j) + assert glTransposed.startswith('float[%s]('% i*j) + else: + assert gl.startswith('float[%s](' % (i*j)) + assert glTransposed.startswith('float[%s](' % (i*j)) + glNested = glsl_code(A,mat_nested=True) + glNestedTransposed = glsl_code(A,mat_transpose=True,mat_nested=True) + assert glNested.startswith('float[%s][%s]' % (i,j)) + assert glNestedTransposed.startswith('float[%s][%s]' % (j,i)) + generatedAssertions+=' glNested = \'\'\''+glNested+'\'\'\'\n' + generatedAssertions+=' glNestedTransposed = \'\'\''+glNestedTransposed+'\'\'\'\n\n' + generatedAssertions+=' assert glsl_code(mat,mat_nested=True) == glNested\n' + generatedAssertions+=' assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed\n\n' + generateAssertions = False # set this to true to write bake these generated tests to a file + if generateAssertions: + gen = open('test_glsl_generated_matrices.py','w') + gen.write(generatedAssertions) + gen.close() + + +# these assertions were generated from the previous function +# glsl has complicated rules and this makes it easier to look over all the cases +def test_misc_mats(): + + mat = Matrix([[0]]) + + gl = '''0''' + glTransposed = '''0''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([[0, 1]]) + + gl = '''vec2(0, 1)''' + glTransposed = '''vec2(0, 1)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([[0, 1, 2]]) + + gl = '''vec3(0, 1, 2)''' + glTransposed = '''vec3(0, 1, 2)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([[0, 1, 2, 3]]) + + gl = '''vec4(0, 1, 2, 3)''' + glTransposed = '''vec4(0, 1, 2, 3)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([[0, 1, 2, 3, 4]]) + + gl = '''float[5](0, 1, 2, 3, 4)''' + glTransposed = '''float[5](0, 1, 2, 3, 4)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0], +[1]]) + + gl = '''vec2(0, 1)''' + glTransposed = '''vec2(0, 1)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1], +[2, 3]]) + + gl = '''mat2(0, 1, 2, 3)''' + glTransposed = '''mat2(0, 2, 1, 3)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2], +[3, 4, 5]]) + + gl = '''mat3x2(0, 1, 2, 3, 4, 5)''' + glTransposed = '''mat2x3(0, 3, 1, 4, 2, 5)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2, 3], +[4, 5, 6, 7]]) + + gl = '''mat4x2(0, 1, 2, 3, 4, 5, 6, 7)''' + glTransposed = '''mat2x4(0, 4, 1, 5, 2, 6, 3, 7)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2, 3, 4], +[5, 6, 7, 8, 9]]) + + gl = '''float[10]( + 0, 1, 2, 3, 4, + 5, 6, 7, 8, 9 +) /* a 2x5 matrix */''' + glTransposed = '''float[10]( + 0, 5, + 1, 6, + 2, 7, + 3, 8, + 4, 9 +) /* a 5x2 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[2][5]( + float[](0, 1, 2, 3, 4), + float[](5, 6, 7, 8, 9) +)''' + glNestedTransposed = '''float[5][2]( + float[](0, 5), + float[](1, 6), + float[](2, 7), + float[](3, 8), + float[](4, 9) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[0], +[1], +[2]]) + + gl = '''vec3(0, 1, 2)''' + glTransposed = '''vec3(0, 1, 2)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1], +[2, 3], +[4, 5]]) + + gl = '''mat2x3(0, 1, 2, 3, 4, 5)''' + glTransposed = '''mat3x2(0, 2, 4, 1, 3, 5)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2], +[3, 4, 5], +[6, 7, 8]]) + + gl = '''mat3(0, 1, 2, 3, 4, 5, 6, 7, 8)''' + glTransposed = '''mat3(0, 3, 6, 1, 4, 7, 2, 5, 8)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2, 3], +[4, 5, 6, 7], +[8, 9, 10, 11]]) + + gl = '''mat4x3(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11)''' + glTransposed = '''mat3x4(0, 4, 8, 1, 5, 9, 2, 6, 10, 3, 7, 11)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[ 0, 1, 2, 3, 4], +[ 5, 6, 7, 8, 9], +[10, 11, 12, 13, 14]]) + + gl = '''float[15]( + 0, 1, 2, 3, 4, + 5, 6, 7, 8, 9, + 10, 11, 12, 13, 14 +) /* a 3x5 matrix */''' + glTransposed = '''float[15]( + 0, 5, 10, + 1, 6, 11, + 2, 7, 12, + 3, 8, 13, + 4, 9, 14 +) /* a 5x3 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[3][5]( + float[]( 0, 1, 2, 3, 4), + float[]( 5, 6, 7, 8, 9), + float[](10, 11, 12, 13, 14) +)''' + glNestedTransposed = '''float[5][3]( + float[](0, 5, 10), + float[](1, 6, 11), + float[](2, 7, 12), + float[](3, 8, 13), + float[](4, 9, 14) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[0], +[1], +[2], +[3]]) + + gl = '''vec4(0, 1, 2, 3)''' + glTransposed = '''vec4(0, 1, 2, 3)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1], +[2, 3], +[4, 5], +[6, 7]]) + + gl = '''mat2x4(0, 1, 2, 3, 4, 5, 6, 7)''' + glTransposed = '''mat4x2(0, 2, 4, 6, 1, 3, 5, 7)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1, 2], +[3, 4, 5], +[6, 7, 8], +[9, 10, 11]]) + + gl = '''mat3x4(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11)''' + glTransposed = '''mat4x3(0, 3, 6, 9, 1, 4, 7, 10, 2, 5, 8, 11)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[ 0, 1, 2, 3], +[ 4, 5, 6, 7], +[ 8, 9, 10, 11], +[12, 13, 14, 15]]) + + gl = '''mat4( 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15)''' + glTransposed = '''mat4(0, 4, 8, 12, 1, 5, 9, 13, 2, 6, 10, 14, 3, 7, 11, 15)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[ 0, 1, 2, 3, 4], +[ 5, 6, 7, 8, 9], +[10, 11, 12, 13, 14], +[15, 16, 17, 18, 19]]) + + gl = '''float[20]( + 0, 1, 2, 3, 4, + 5, 6, 7, 8, 9, + 10, 11, 12, 13, 14, + 15, 16, 17, 18, 19 +) /* a 4x5 matrix */''' + glTransposed = '''float[20]( + 0, 5, 10, 15, + 1, 6, 11, 16, + 2, 7, 12, 17, + 3, 8, 13, 18, + 4, 9, 14, 19 +) /* a 5x4 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[4][5]( + float[]( 0, 1, 2, 3, 4), + float[]( 5, 6, 7, 8, 9), + float[](10, 11, 12, 13, 14), + float[](15, 16, 17, 18, 19) +)''' + glNestedTransposed = '''float[5][4]( + float[](0, 5, 10, 15), + float[](1, 6, 11, 16), + float[](2, 7, 12, 17), + float[](3, 8, 13, 18), + float[](4, 9, 14, 19) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[0], +[1], +[2], +[3], +[4]]) + + gl = '''float[5](0, 1, 2, 3, 4)''' + glTransposed = '''float[5](0, 1, 2, 3, 4)''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + + mat = Matrix([ +[0, 1], +[2, 3], +[4, 5], +[6, 7], +[8, 9]]) + + gl = '''float[10]( + 0, 1, + 2, 3, + 4, 5, + 6, 7, + 8, 9 +) /* a 5x2 matrix */''' + glTransposed = '''float[10]( + 0, 2, 4, 6, 8, + 1, 3, 5, 7, 9 +) /* a 2x5 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[5][2]( + float[](0, 1), + float[](2, 3), + float[](4, 5), + float[](6, 7), + float[](8, 9) +)''' + glNestedTransposed = '''float[2][5]( + float[](0, 2, 4, 6, 8), + float[](1, 3, 5, 7, 9) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[ 0, 1, 2], +[ 3, 4, 5], +[ 6, 7, 8], +[ 9, 10, 11], +[12, 13, 14]]) + + gl = '''float[15]( + 0, 1, 2, + 3, 4, 5, + 6, 7, 8, + 9, 10, 11, + 12, 13, 14 +) /* a 5x3 matrix */''' + glTransposed = '''float[15]( + 0, 3, 6, 9, 12, + 1, 4, 7, 10, 13, + 2, 5, 8, 11, 14 +) /* a 3x5 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[5][3]( + float[]( 0, 1, 2), + float[]( 3, 4, 5), + float[]( 6, 7, 8), + float[]( 9, 10, 11), + float[](12, 13, 14) +)''' + glNestedTransposed = '''float[3][5]( + float[](0, 3, 6, 9, 12), + float[](1, 4, 7, 10, 13), + float[](2, 5, 8, 11, 14) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[ 0, 1, 2, 3], +[ 4, 5, 6, 7], +[ 8, 9, 10, 11], +[12, 13, 14, 15], +[16, 17, 18, 19]]) + + gl = '''float[20]( + 0, 1, 2, 3, + 4, 5, 6, 7, + 8, 9, 10, 11, + 12, 13, 14, 15, + 16, 17, 18, 19 +) /* a 5x4 matrix */''' + glTransposed = '''float[20]( + 0, 4, 8, 12, 16, + 1, 5, 9, 13, 17, + 2, 6, 10, 14, 18, + 3, 7, 11, 15, 19 +) /* a 4x5 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[5][4]( + float[]( 0, 1, 2, 3), + float[]( 4, 5, 6, 7), + float[]( 8, 9, 10, 11), + float[](12, 13, 14, 15), + float[](16, 17, 18, 19) +)''' + glNestedTransposed = '''float[4][5]( + float[](0, 4, 8, 12, 16), + float[](1, 5, 9, 13, 17), + float[](2, 6, 10, 14, 18), + float[](3, 7, 11, 15, 19) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed + + mat = Matrix([ +[ 0, 1, 2, 3, 4], +[ 5, 6, 7, 8, 9], +[10, 11, 12, 13, 14], +[15, 16, 17, 18, 19], +[20, 21, 22, 23, 24]]) + + gl = '''float[25]( + 0, 1, 2, 3, 4, + 5, 6, 7, 8, 9, + 10, 11, 12, 13, 14, + 15, 16, 17, 18, 19, + 20, 21, 22, 23, 24 +) /* a 5x5 matrix */''' + glTransposed = '''float[25]( + 0, 5, 10, 15, 20, + 1, 6, 11, 16, 21, + 2, 7, 12, 17, 22, + 3, 8, 13, 18, 23, + 4, 9, 14, 19, 24 +) /* a 5x5 matrix */''' + + assert glsl_code(mat) == gl + assert glsl_code(mat,mat_transpose=True) == glTransposed + glNested = '''float[5][5]( + float[]( 0, 1, 2, 3, 4), + float[]( 5, 6, 7, 8, 9), + float[](10, 11, 12, 13, 14), + float[](15, 16, 17, 18, 19), + float[](20, 21, 22, 23, 24) +)''' + glNestedTransposed = '''float[5][5]( + float[](0, 5, 10, 15, 20), + float[](1, 6, 11, 16, 21), + float[](2, 7, 12, 17, 22), + float[](3, 8, 13, 18, 23), + float[](4, 9, 14, 19, 24) +)''' + + assert glsl_code(mat,mat_nested=True) == glNested + assert glsl_code(mat,mat_nested=True,mat_transpose=True) == glNestedTransposed diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_gtk.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_gtk.py new file mode 100644 index 0000000000000000000000000000000000000000..5a595ab04d3a29d23e06ec12207bf917392aebce --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_gtk.py @@ -0,0 +1,18 @@ +from sympy.functions.elementary.trigonometric import sin +from sympy.printing.gtk import print_gtk +from sympy.testing.pytest import XFAIL, raises + +# this test fails if python-lxml isn't installed. We don't want to depend on +# anything with SymPy + + +@XFAIL +def test_1(): + from sympy.abc import x + print_gtk(x**2, start_viewer=False) + print_gtk(x**2 + sin(x)/4, start_viewer=False) + + +def test_settings(): + from sympy.abc import x + raises(TypeError, lambda: print_gtk(x, method="garbage")) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jax.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jax.py new file mode 100644 index 0000000000000000000000000000000000000000..365d87c5b91fdd49a8e46cfde9c2b5792c23a03c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jax.py @@ -0,0 +1,370 @@ +from sympy.concrete.summations import Sum +from sympy.core.mod import Mod +from sympy.core.relational import (Equality, Unequality) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.matrices.expressions.blockmatrix import BlockMatrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.special import Identity +from sympy.utilities.lambdify import lambdify + +from sympy.abc import x, i, j, a, b, c, d +from sympy.core import Function, Pow, Symbol +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.codegen.numpy_nodes import logaddexp, logaddexp2 +from sympy.codegen.cfunctions import log1p, expm1, hypot, log10, exp2, log2, Sqrt +from sympy.tensor.array import Array +from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct, ArrayAdd, \ + PermuteDims, ArrayDiagonal +from sympy.printing.numpy import JaxPrinter, _jax_known_constants, _jax_known_functions +from sympy.tensor.array.expressions.from_matrix_to_array import convert_matrix_to_array + +from sympy.testing.pytest import skip, raises +from sympy.external import import_module + +# Unlike NumPy which will aggressively promote operands to double precision, +# jax always uses single precision. Double precision in jax can be +# configured before the call to `import jax`, however this must be explicitly +# configured and is not fully supported. Thus, the tests here have been modified +# from the tests in test_numpy.py, only in the fact that they assert lambdify +# function accuracy to only single precision accuracy. +# https://jax.readthedocs.io/en/latest/notebooks/Common_Gotchas_in_JAX.html#double-64bit-precision + +jax = import_module('jax') + +if jax: + deafult_float_info = jax.numpy.finfo(jax.numpy.array([]).dtype) + JAX_DEFAULT_EPSILON = deafult_float_info.eps + + +def test_jax_piecewise_regression(): + """ + NumPyPrinter needs to print Piecewise()'s choicelist as a list to avoid + breaking compatibility with numpy 1.8. This is not necessary in numpy 1.9+. + See gh-9747 and gh-9749 for details. + """ + printer = JaxPrinter() + p = Piecewise((1, x < 0), (0, True)) + assert printer.doprint(p) == \ + 'jax.numpy.select([jax.numpy.less(x, 0),True], [1,0], default=jax.numpy.nan)' + assert printer.module_imports == {'jax.numpy': {'select', 'less', 'nan'}} + + +def test_jax_logaddexp(): + lae = logaddexp(a, b) + assert JaxPrinter().doprint(lae) == 'jax.numpy.logaddexp(a, b)' + lae2 = logaddexp2(a, b) + assert JaxPrinter().doprint(lae2) == 'jax.numpy.logaddexp2(a, b)' + + +def test_jax_sum(): + if not jax: + skip("JAX not installed") + + s = Sum(x ** i, (i, a, b)) + f = lambdify((a, b, x), s, 'jax') + + a_, b_ = 0, 10 + x_ = jax.numpy.linspace(-1, +1, 10) + assert jax.numpy.allclose(f(a_, b_, x_), sum(x_ ** i_ for i_ in range(a_, b_ + 1))) + + s = Sum(i * x, (i, a, b)) + f = lambdify((a, b, x), s, 'jax') + + a_, b_ = 0, 10 + x_ = jax.numpy.linspace(-1, +1, 10) + assert jax.numpy.allclose(f(a_, b_, x_), sum(i_ * x_ for i_ in range(a_, b_ + 1))) + + +def test_jax_multiple_sums(): + if not jax: + skip("JAX not installed") + + s = Sum((x + j) * i, (i, a, b), (j, c, d)) + f = lambdify((a, b, c, d, x), s, 'jax') + + a_, b_ = 0, 10 + c_, d_ = 11, 21 + x_ = jax.numpy.linspace(-1, +1, 10) + assert jax.numpy.allclose(f(a_, b_, c_, d_, x_), + sum((x_ + j_) * i_ for i_ in range(a_, b_ + 1) for j_ in range(c_, d_ + 1))) + + +def test_jax_codegen_einsum(): + if not jax: + skip("JAX not installed") + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + + cg = convert_matrix_to_array(M * N) + f = lambdify((M, N), cg, 'jax') + + ma = jax.numpy.array([[1, 2], [3, 4]]) + mb = jax.numpy.array([[1,-2], [-1, 3]]) + assert (f(ma, mb) == jax.numpy.matmul(ma, mb)).all() + + +def test_jax_codegen_extra(): + if not jax: + skip("JAX not installed") + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + P = MatrixSymbol("P", 2, 2) + Q = MatrixSymbol("Q", 2, 2) + ma = jax.numpy.array([[1, 2], [3, 4]]) + mb = jax.numpy.array([[1,-2], [-1, 3]]) + mc = jax.numpy.array([[2, 0], [1, 2]]) + md = jax.numpy.array([[1,-1], [4, 7]]) + + cg = ArrayTensorProduct(M, N) + f = lambdify((M, N), cg, 'jax') + assert (f(ma, mb) == jax.numpy.einsum(ma, [0, 1], mb, [2, 3])).all() + + cg = ArrayAdd(M, N) + f = lambdify((M, N), cg, 'jax') + assert (f(ma, mb) == ma+mb).all() + + cg = ArrayAdd(M, N, P) + f = lambdify((M, N, P), cg, 'jax') + assert (f(ma, mb, mc) == ma+mb+mc).all() + + cg = ArrayAdd(M, N, P, Q) + f = lambdify((M, N, P, Q), cg, 'jax') + assert (f(ma, mb, mc, md) == ma+mb+mc+md).all() + + cg = PermuteDims(M, [1, 0]) + f = lambdify((M,), cg, 'jax') + assert (f(ma) == ma.T).all() + + cg = PermuteDims(ArrayTensorProduct(M, N), [1, 2, 3, 0]) + f = lambdify((M, N), cg, 'jax') + assert (f(ma, mb) == jax.numpy.transpose(jax.numpy.einsum(ma, [0, 1], mb, [2, 3]), (1, 2, 3, 0))).all() + + cg = ArrayDiagonal(ArrayTensorProduct(M, N), (1, 2)) + f = lambdify((M, N), cg, 'jax') + assert (f(ma, mb) == jax.numpy.diagonal(jax.numpy.einsum(ma, [0, 1], mb, [2, 3]), axis1=1, axis2=2)).all() + + +def test_jax_relational(): + if not jax: + skip("JAX not installed") + + e = Equality(x, 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [False, True, False]) + + e = Unequality(x, 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [True, False, True]) + + e = (x < 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [True, False, False]) + + e = (x <= 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [True, True, False]) + + e = (x > 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [False, False, True]) + + e = (x >= 1) + + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [False, True, True]) + + # Multi-condition expressions + e = (x >= 1) & (x < 2) + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [False, True, False]) + + e = (x >= 1) | (x < 2) + f = lambdify((x,), e, 'jax') + x_ = jax.numpy.array([0, 1, 2]) + assert jax.numpy.array_equal(f(x_), [True, True, True]) + +def test_jax_mod(): + if not jax: + skip("JAX not installed") + + e = Mod(a, b) + f = lambdify((a, b), e, 'jax') + + a_ = jax.numpy.array([0, 1, 2, 3]) + b_ = 2 + assert jax.numpy.array_equal(f(a_, b_), [0, 1, 0, 1]) + + a_ = jax.numpy.array([0, 1, 2, 3]) + b_ = jax.numpy.array([2, 2, 2, 2]) + assert jax.numpy.array_equal(f(a_, b_), [0, 1, 0, 1]) + + a_ = jax.numpy.array([2, 3, 4, 5]) + b_ = jax.numpy.array([2, 3, 4, 5]) + assert jax.numpy.array_equal(f(a_, b_), [0, 0, 0, 0]) + + +def test_jax_pow(): + if not jax: + skip('JAX not installed') + + expr = Pow(2, -1, evaluate=False) + f = lambdify([], expr, 'jax') + assert f() == 0.5 + + +def test_jax_expm1(): + if not jax: + skip("JAX not installed") + + f = lambdify((a,), expm1(a), 'jax') + assert abs(f(1e-10) - 1e-10 - 5e-21) <= 1e-10 * JAX_DEFAULT_EPSILON + + +def test_jax_log1p(): + if not jax: + skip("JAX not installed") + + f = lambdify((a,), log1p(a), 'jax') + assert abs(f(1e-99) - 1e-99) <= 1e-99 * JAX_DEFAULT_EPSILON + +def test_jax_hypot(): + if not jax: + skip("JAX not installed") + assert abs(lambdify((a, b), hypot(a, b), 'jax')(3, 4) - 5) <= JAX_DEFAULT_EPSILON + +def test_jax_log10(): + if not jax: + skip("JAX not installed") + + assert abs(lambdify((a,), log10(a), 'jax')(100) - 2) <= JAX_DEFAULT_EPSILON + + +def test_jax_exp2(): + if not jax: + skip("JAX not installed") + assert abs(lambdify((a,), exp2(a), 'jax')(5) - 32) <= JAX_DEFAULT_EPSILON + + +def test_jax_log2(): + if not jax: + skip("JAX not installed") + assert abs(lambdify((a,), log2(a), 'jax')(256) - 8) <= JAX_DEFAULT_EPSILON + + +def test_jax_Sqrt(): + if not jax: + skip("JAX not installed") + assert abs(lambdify((a,), Sqrt(a), 'jax')(4) - 2) <= JAX_DEFAULT_EPSILON + + +def test_jax_sqrt(): + if not jax: + skip("JAX not installed") + assert abs(lambdify((a,), sqrt(a), 'jax')(4) - 2) <= JAX_DEFAULT_EPSILON + + +def test_jax_matsolve(): + if not jax: + skip("JAX not installed") + + M = MatrixSymbol("M", 3, 3) + x = MatrixSymbol("x", 3, 1) + + expr = M**(-1) * x + x + matsolve_expr = MatrixSolve(M, x) + x + + f = lambdify((M, x), expr, 'jax') + f_matsolve = lambdify((M, x), matsolve_expr, 'jax') + + m0 = jax.numpy.array([[1, 2, 3], [3, 2, 5], [5, 6, 7]]) + assert jax.numpy.linalg.matrix_rank(m0) == 3 + + x0 = jax.numpy.array([3, 4, 5]) + + assert jax.numpy.allclose(f_matsolve(m0, x0), f(m0, x0)) + + +def test_16857(): + if not jax: + skip("JAX not installed") + + a_1 = MatrixSymbol('a_1', 10, 3) + a_2 = MatrixSymbol('a_2', 10, 3) + a_3 = MatrixSymbol('a_3', 10, 3) + a_4 = MatrixSymbol('a_4', 10, 3) + A = BlockMatrix([[a_1, a_2], [a_3, a_4]]) + assert A.shape == (20, 6) + + printer = JaxPrinter() + assert printer.doprint(A) == 'jax.numpy.block([[a_1, a_2], [a_3, a_4]])' + + +def test_issue_17006(): + if not jax: + skip("JAX not installed") + + M = MatrixSymbol("M", 2, 2) + + f = lambdify(M, M + Identity(2), 'jax') + ma = jax.numpy.array([[1, 2], [3, 4]]) + mr = jax.numpy.array([[2, 2], [3, 5]]) + + assert (f(ma) == mr).all() + + from sympy.core.symbol import symbols + n = symbols('n', integer=True) + N = MatrixSymbol("M", n, n) + raises(NotImplementedError, lambda: lambdify(N, N + Identity(n), 'jax')) + + +def test_jax_array(): + assert JaxPrinter().doprint(Array(((1, 2), (3, 5)))) == 'jax.numpy.array([[1, 2], [3, 5]])' + assert JaxPrinter().doprint(Array((1, 2))) == 'jax.numpy.array([1, 2])' + + +def test_jax_known_funcs_consts(): + assert _jax_known_constants['NaN'] == 'jax.numpy.nan' + assert _jax_known_constants['EulerGamma'] == 'jax.numpy.euler_gamma' + + assert _jax_known_functions['acos'] == 'jax.numpy.arccos' + assert _jax_known_functions['log'] == 'jax.numpy.log' + + +def test_jax_print_methods(): + prntr = JaxPrinter() + assert hasattr(prntr, '_print_acos') + assert hasattr(prntr, '_print_log') + + +def test_jax_printmethod(): + printer = JaxPrinter() + assert hasattr(printer, 'printmethod') + assert printer.printmethod == '_jaxcode' + + +def test_jax_custom_print_method(): + + class expm1(Function): + + def _jaxcode(self, printer): + x, = self.args + function = f'expm1({printer._print(x)})' + return printer._module_format(printer._module + '.' + function) + + printer = JaxPrinter() + assert printer.doprint(expm1(Symbol('x'))) == 'jax.numpy.expm1(x)' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jscode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jscode.py new file mode 100644 index 0000000000000000000000000000000000000000..9199a8e0d62e87f2e964cb1712726a21c894fd20 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_jscode.py @@ -0,0 +1,396 @@ +from sympy.core import (pi, oo, symbols, Rational, Integer, GoldenRatio, + EulerGamma, Catalan, Lambda, Dummy, S, Eq, Ne, Le, + Lt, Gt, Ge, Mod) +from sympy.functions import (Piecewise, sin, cos, Abs, exp, ceiling, sqrt, + sinh, cosh, tanh, asin, acos, acosh, Max, Min) +from sympy.testing.pytest import raises +from sympy.printing.jscode import JavascriptCodePrinter +from sympy.utilities.lambdify import implemented_function +from sympy.tensor import IndexedBase, Idx +from sympy.matrices import Matrix, MatrixSymbol + +from sympy.printing.jscode import jscode + +x, y, z = symbols('x,y,z') + + +def test_printmethod(): + assert jscode(Abs(x)) == "Math.abs(x)" + + +def test_jscode_sqrt(): + assert jscode(sqrt(x)) == "Math.sqrt(x)" + assert jscode(x**0.5) == "Math.sqrt(x)" + assert jscode(x**(S.One/3)) == "Math.cbrt(x)" + + +def test_jscode_Pow(): + g = implemented_function('g', Lambda(x, 2*x)) + assert jscode(x**3) == "Math.pow(x, 3)" + assert jscode(x**(y**3)) == "Math.pow(x, Math.pow(y, 3))" + assert jscode(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "Math.pow(3.5*2*x, -x + Math.pow(y, x))/(Math.pow(x, 2) + y)" + assert jscode(x**-1.0) == '1/x' + + +def test_jscode_constants_mathh(): + assert jscode(exp(1)) == "Math.E" + assert jscode(pi) == "Math.PI" + assert jscode(oo) == "Number.POSITIVE_INFINITY" + assert jscode(-oo) == "Number.NEGATIVE_INFINITY" + + +def test_jscode_constants_other(): + assert jscode( + 2*GoldenRatio) == "var GoldenRatio = %s;\n2*GoldenRatio" % GoldenRatio.evalf(17) + assert jscode(2*Catalan) == "var Catalan = %s;\n2*Catalan" % Catalan.evalf(17) + assert jscode( + 2*EulerGamma) == "var EulerGamma = %s;\n2*EulerGamma" % EulerGamma.evalf(17) + + +def test_jscode_Rational(): + assert jscode(Rational(3, 7)) == "3/7" + assert jscode(Rational(18, 9)) == "2" + assert jscode(Rational(3, -7)) == "-3/7" + assert jscode(Rational(-3, -7)) == "3/7" + + +def test_Relational(): + assert jscode(Eq(x, y)) == "x == y" + assert jscode(Ne(x, y)) == "x != y" + assert jscode(Le(x, y)) == "x <= y" + assert jscode(Lt(x, y)) == "x < y" + assert jscode(Gt(x, y)) == "x > y" + assert jscode(Ge(x, y)) == "x >= y" + + +def test_Mod(): + assert jscode(Mod(x, y)) == '((x % y) + y) % y' + assert jscode(Mod(x, x + y)) == '((x % (x + y)) + (x + y)) % (x + y)' + p1, p2 = symbols('p1 p2', positive=True) + assert jscode(Mod(p1, p2)) == 'p1 % p2' + assert jscode(Mod(p1, p2 + 3)) == 'p1 % (p2 + 3)' + assert jscode(Mod(-3, -7, evaluate=False)) == '(-3) % (-7)' + assert jscode(-Mod(p1, p2)) == '-(p1 % p2)' + assert jscode(x*Mod(p1, p2)) == 'x*(p1 % p2)' + + +def test_jscode_Integer(): + assert jscode(Integer(67)) == "67" + assert jscode(Integer(-1)) == "-1" + + +def test_jscode_functions(): + assert jscode(sin(x) ** cos(x)) == "Math.pow(Math.sin(x), Math.cos(x))" + assert jscode(sinh(x) * cosh(x)) == "Math.sinh(x)*Math.cosh(x)" + assert jscode(Max(x, y) + Min(x, y)) == "Math.max(x, y) + Math.min(x, y)" + assert jscode(tanh(x)*acosh(y)) == "Math.tanh(x)*Math.acosh(y)" + assert jscode(asin(x)-acos(y)) == "-Math.acos(y) + Math.asin(x)" + + +def test_jscode_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert jscode(g(x)) == "2*x" + g = implemented_function('g', Lambda(x, 2*x/Catalan)) + assert jscode(g(x)) == "var Catalan = %s;\n2*x/Catalan" % Catalan.evalf(17) + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + assert jscode(g(A[i]), assign_to=A[i]) == ( + "for (var i=0; i 1), (sin(x), x > 0)) + raises(ValueError, lambda: jscode(expr)) + + +def test_jscode_Piecewise_deep(): + p = jscode(2*Piecewise((x, x < 1), (x**2, True))) + s = \ +"""\ +2*((x < 1) ? ( + x +) +: ( + Math.pow(x, 2) +))\ +""" + assert p == s + + +def test_jscode_settings(): + raises(TypeError, lambda: jscode(sin(x), method="garbage")) + + +def test_jscode_Indexed(): + n, m, o = symbols('n m o', integer=True) + i, j, k = Idx('i', n), Idx('j', m), Idx('k', o) + p = JavascriptCodePrinter() + p._not_c = set() + + x = IndexedBase('x')[j] + assert p._print_Indexed(x) == 'x[j]' + A = IndexedBase('A')[i, j] + assert p._print_Indexed(A) == 'A[%s]' % (m*i+j) + B = IndexedBase('B')[i, j, k] + assert p._print_Indexed(B) == 'B[%s]' % (i*o*m+j*o+k) + + assert p._not_c == set() + + +def test_jscode_loops_matrix_vector(): + n, m = symbols('n m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + + s = ( + 'for (var i=0; i0), (y, True)), sin(z)]) + A = MatrixSymbol('A', 3, 1) + assert jscode(mat, A) == ( + "A[0] = x*y;\n" + "if (y > 0) {\n" + " A[1] = x + 2;\n" + "}\n" + "else {\n" + " A[1] = y;\n" + "}\n" + "A[2] = Math.sin(z);") + # Test using MatrixElements in expressions + expr = Piecewise((2*A[2, 0], x > 0), (A[2, 0], True)) + sin(A[1, 0]) + A[0, 0] + assert jscode(expr) == ( + "((x > 0) ? (\n" + " 2*A[2]\n" + ")\n" + ": (\n" + " A[2]\n" + ")) + Math.sin(A[1]) + A[0]") + # Test using MatrixElements in a Matrix + q = MatrixSymbol('q', 5, 1) + M = MatrixSymbol('M', 3, 3) + m = Matrix([[sin(q[1,0]), 0, cos(q[2,0])], + [q[1,0] + q[2,0], q[3, 0], 5], + [2*q[4, 0]/q[1,0], sqrt(q[0,0]) + 4, 0]]) + assert jscode(m, M) == ( + "M[0] = Math.sin(q[1]);\n" + "M[1] = 0;\n" + "M[2] = Math.cos(q[2]);\n" + "M[3] = q[1] + q[2];\n" + "M[4] = q[3];\n" + "M[5] = 5;\n" + "M[6] = 2*q[4]/q[1];\n" + "M[7] = Math.sqrt(q[0]) + 4;\n" + "M[8] = 0;") + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(jscode(A[0, 0]) == "A[0]") + assert(jscode(3 * A[0, 0]) == "3*A[0]") + + F = C[0, 0].subs(C, A - B) + assert(jscode(F) == "(A - B)[0]") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_julia.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_julia.py new file mode 100644 index 0000000000000000000000000000000000000000..b19c7b4fd4f21d8402ca2f577605322b3ec10f5b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_julia.py @@ -0,0 +1,390 @@ +from sympy.core import (S, pi, oo, symbols, Function, Rational, Integer, + Tuple, Symbol, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.core import EulerGamma, GoldenRatio, Catalan, Lambda, Mul, Pow +from sympy.functions import Piecewise, sqrt, ceiling, exp, sin, cos, sinc +from sympy.testing.pytest import raises +from sympy.utilities.lambdify import implemented_function +from sympy.matrices import (eye, Matrix, MatrixSymbol, Identity, + HadamardProduct, SparseMatrix) +from sympy.functions.special.bessel import (jn, yn, besselj, bessely, besseli, + besselk, hankel1, hankel2, airyai, + airybi, airyaiprime, airybiprime) +from sympy.testing.pytest import XFAIL + +from sympy.printing.julia import julia_code + +x, y, z = symbols('x,y,z') + + +def test_Integer(): + assert julia_code(Integer(67)) == "67" + assert julia_code(Integer(-1)) == "-1" + + +def test_Rational(): + assert julia_code(Rational(3, 7)) == "3 // 7" + assert julia_code(Rational(18, 9)) == "2" + assert julia_code(Rational(3, -7)) == "-3 // 7" + assert julia_code(Rational(-3, -7)) == "3 // 7" + assert julia_code(x + Rational(3, 7)) == "x + 3 // 7" + assert julia_code(Rational(3, 7)*x) == "(3 // 7) * x" + + +def test_Relational(): + assert julia_code(Eq(x, y)) == "x == y" + assert julia_code(Ne(x, y)) == "x != y" + assert julia_code(Le(x, y)) == "x <= y" + assert julia_code(Lt(x, y)) == "x < y" + assert julia_code(Gt(x, y)) == "x > y" + assert julia_code(Ge(x, y)) == "x >= y" + + +def test_Function(): + assert julia_code(sin(x) ** cos(x)) == "sin(x) .^ cos(x)" + assert julia_code(abs(x)) == "abs(x)" + assert julia_code(ceiling(x)) == "ceil(x)" + + +def test_Pow(): + assert julia_code(x**3) == "x .^ 3" + assert julia_code(x**(y**3)) == "x .^ (y .^ 3)" + assert julia_code(x**Rational(2, 3)) == 'x .^ (2 // 3)' + g = implemented_function('g', Lambda(x, 2*x)) + assert julia_code(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "(3.5 * 2 * x) .^ (-x + y .^ x) ./ (x .^ 2 + y)" + # For issue 14160 + assert julia_code(Mul(-2, x, Pow(Mul(y,y,evaluate=False), -1, evaluate=False), + evaluate=False)) == '-2 * x ./ (y .* y)' + + +def test_basic_ops(): + assert julia_code(x*y) == "x .* y" + assert julia_code(x + y) == "x + y" + assert julia_code(x - y) == "x - y" + assert julia_code(-x) == "-x" + + +def test_1_over_x_and_sqrt(): + # 1.0 and 0.5 would do something different in regular StrPrinter, + # but these are exact in IEEE floating point so no different here. + assert julia_code(1/x) == '1 ./ x' + assert julia_code(x**-1) == julia_code(x**-1.0) == '1 ./ x' + assert julia_code(1/sqrt(x)) == '1 ./ sqrt(x)' + assert julia_code(x**-S.Half) == julia_code(x**-0.5) == '1 ./ sqrt(x)' + assert julia_code(sqrt(x)) == 'sqrt(x)' + assert julia_code(x**S.Half) == julia_code(x**0.5) == 'sqrt(x)' + assert julia_code(1/pi) == '1 / pi' + assert julia_code(pi**-1) == julia_code(pi**-1.0) == '1 / pi' + assert julia_code(pi**-0.5) == '1 / sqrt(pi)' + + +def test_mix_number_mult_symbols(): + assert julia_code(3*x) == "3 * x" + assert julia_code(pi*x) == "pi * x" + assert julia_code(3/x) == "3 ./ x" + assert julia_code(pi/x) == "pi ./ x" + assert julia_code(x/3) == "x / 3" + assert julia_code(x/pi) == "x / pi" + assert julia_code(x*y) == "x .* y" + assert julia_code(3*x*y) == "3 * x .* y" + assert julia_code(3*pi*x*y) == "3 * pi * x .* y" + assert julia_code(x/y) == "x ./ y" + assert julia_code(3*x/y) == "3 * x ./ y" + assert julia_code(x*y/z) == "x .* y ./ z" + assert julia_code(x/y*z) == "x .* z ./ y" + assert julia_code(1/x/y) == "1 ./ (x .* y)" + assert julia_code(2*pi*x/y/z) == "2 * pi * x ./ (y .* z)" + assert julia_code(3*pi/x) == "3 * pi ./ x" + assert julia_code(S(3)/5) == "3 // 5" + assert julia_code(S(3)/5*x) == "(3 // 5) * x" + assert julia_code(x/y/z) == "x ./ (y .* z)" + assert julia_code((x+y)/z) == "(x + y) ./ z" + assert julia_code((x+y)/(z+x)) == "(x + y) ./ (x + z)" + assert julia_code((x+y)/EulerGamma) == "(x + y) / eulergamma" + assert julia_code(x/3/pi) == "x / (3 * pi)" + assert julia_code(S(3)/5*x*y/pi) == "(3 // 5) * x .* y / pi" + + +def test_mix_number_pow_symbols(): + assert julia_code(pi**3) == 'pi ^ 3' + assert julia_code(x**2) == 'x .^ 2' + assert julia_code(x**(pi**3)) == 'x .^ (pi ^ 3)' + assert julia_code(x**y) == 'x .^ y' + assert julia_code(x**(y**z)) == 'x .^ (y .^ z)' + assert julia_code((x**y)**z) == '(x .^ y) .^ z' + + +def test_imag(): + I = S('I') + assert julia_code(I) == "im" + assert julia_code(5*I) == "5im" + assert julia_code((S(3)/2)*I) == "(3 // 2) * im" + assert julia_code(3+4*I) == "3 + 4im" + + +def test_constants(): + assert julia_code(pi) == "pi" + assert julia_code(oo) == "Inf" + assert julia_code(-oo) == "-Inf" + assert julia_code(S.NegativeInfinity) == "-Inf" + assert julia_code(S.NaN) == "NaN" + assert julia_code(S.Exp1) == "e" + assert julia_code(exp(1)) == "e" + + +def test_constants_other(): + assert julia_code(2*GoldenRatio) == "2 * golden" + assert julia_code(2*Catalan) == "2 * catalan" + assert julia_code(2*EulerGamma) == "2 * eulergamma" + + +def test_boolean(): + assert julia_code(x & y) == "x && y" + assert julia_code(x | y) == "x || y" + assert julia_code(~x) == "!x" + assert julia_code(x & y & z) == "x && y && z" + assert julia_code(x | y | z) == "x || y || z" + assert julia_code((x & y) | z) == "z || x && y" + assert julia_code((x | y) & z) == "z && (x || y)" + +def test_sinc(): + assert julia_code(sinc(x)) == 'sinc(x / pi)' + assert julia_code(sinc(x + 3)) == 'sinc((x + 3) / pi)' + assert julia_code(sinc(pi * (x + 3))) == 'sinc(x + 3)' + +def test_Matrices(): + assert julia_code(Matrix(1, 1, [10])) == "[10]" + A = Matrix([[1, sin(x/2), abs(x)], + [0, 1, pi], + [0, exp(1), ceiling(x)]]) + expected = ("[1 sin(x / 2) abs(x);\n" + "0 1 pi;\n" + "0 e ceil(x)]") + assert julia_code(A) == expected + # row and columns + assert julia_code(A[:,0]) == "[1, 0, 0]" + assert julia_code(A[0,:]) == "[1 sin(x / 2) abs(x)]" + # empty matrices + assert julia_code(Matrix(0, 0, [])) == 'zeros(0, 0)' + assert julia_code(Matrix(0, 3, [])) == 'zeros(0, 3)' + # annoying to read but correct + assert julia_code(Matrix([[x, x - y, -y]])) == "[x x - y -y]" + + +def test_vector_entries_hadamard(): + # For a row or column, user might to use the other dimension + A = Matrix([[1, sin(2/x), 3*pi/x/5]]) + assert julia_code(A) == "[1 sin(2 ./ x) (3 // 5) * pi ./ x]" + assert julia_code(A.T) == "[1, sin(2 ./ x), (3 // 5) * pi ./ x]" + + +@XFAIL +def test_Matrices_entries_not_hadamard(): + # For Matrix with col >= 2, row >= 2, they need to be scalars + # FIXME: is it worth worrying about this? Its not wrong, just + # leave it user's responsibility to put scalar data for x. + A = Matrix([[1, sin(2/x), 3*pi/x/5], [1, 2, x*y]]) + expected = ("[1 sin(2/x) 3*pi/(5*x);\n" + "1 2 x*y]") # <- we give x.*y + assert julia_code(A) == expected + + +def test_MatrixSymbol(): + n = Symbol('n', integer=True) + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, n) + assert julia_code(A*B) == "A * B" + assert julia_code(B*A) == "B * A" + assert julia_code(2*A*B) == "2 * A * B" + assert julia_code(B*2*A) == "2 * B * A" + assert julia_code(A*(B + 3*Identity(n))) == "A * (3 * eye(n) + B)" + assert julia_code(A**(x**2)) == "A ^ (x .^ 2)" + assert julia_code(A**3) == "A ^ 3" + assert julia_code(A**S.Half) == "A ^ (1 // 2)" + + +def test_special_matrices(): + assert julia_code(6*Identity(3)) == "6 * eye(3)" + + +def test_containers(): + assert julia_code([1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]) == \ + "Any[1, 2, 3, Any[4, 5, Any[6, 7]], 8, Any[9, 10], 11]" + assert julia_code((1, 2, (3, 4))) == "(1, 2, (3, 4))" + assert julia_code([1]) == "Any[1]" + assert julia_code((1,)) == "(1,)" + assert julia_code(Tuple(*[1, 2, 3])) == "(1, 2, 3)" + assert julia_code((1, x*y, (3, x**2))) == "(1, x .* y, (3, x .^ 2))" + # scalar, matrix, empty matrix and empty list + assert julia_code((1, eye(3), Matrix(0, 0, []), [])) == "(1, [1 0 0;\n0 1 0;\n0 0 1], zeros(0, 0), Any[])" + + +def test_julia_noninline(): + source = julia_code((x+y)/Catalan, assign_to='me', inline=False) + expected = ( + "const Catalan = %s\n" + "me = (x + y) / Catalan" + ) % Catalan.evalf(17) + assert source == expected + + +def test_julia_piecewise(): + expr = Piecewise((x, x < 1), (x**2, True)) + assert julia_code(expr) == "((x < 1) ? (x) : (x .^ 2))" + assert julia_code(expr, assign_to="r") == ( + "r = ((x < 1) ? (x) : (x .^ 2))") + assert julia_code(expr, assign_to="r", inline=False) == ( + "if (x < 1)\n" + " r = x\n" + "else\n" + " r = x .^ 2\n" + "end") + expr = Piecewise((x**2, x < 1), (x**3, x < 2), (x**4, x < 3), (x**5, True)) + expected = ("((x < 1) ? (x .^ 2) :\n" + "(x < 2) ? (x .^ 3) :\n" + "(x < 3) ? (x .^ 4) : (x .^ 5))") + assert julia_code(expr) == expected + assert julia_code(expr, assign_to="r") == "r = " + expected + assert julia_code(expr, assign_to="r", inline=False) == ( + "if (x < 1)\n" + " r = x .^ 2\n" + "elseif (x < 2)\n" + " r = x .^ 3\n" + "elseif (x < 3)\n" + " r = x .^ 4\n" + "else\n" + " r = x .^ 5\n" + "end") + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: julia_code(expr)) + + +def test_julia_piecewise_times_const(): + pw = Piecewise((x, x < 1), (x**2, True)) + assert julia_code(2*pw) == "2 * ((x < 1) ? (x) : (x .^ 2))" + assert julia_code(pw/x) == "((x < 1) ? (x) : (x .^ 2)) ./ x" + assert julia_code(pw/(x*y)) == "((x < 1) ? (x) : (x .^ 2)) ./ (x .* y)" + assert julia_code(pw/3) == "((x < 1) ? (x) : (x .^ 2)) / 3" + + +def test_julia_matrix_assign_to(): + A = Matrix([[1, 2, 3]]) + assert julia_code(A, assign_to='a') == "a = [1 2 3]" + A = Matrix([[1, 2], [3, 4]]) + assert julia_code(A, assign_to='A') == "A = [1 2;\n3 4]" + + +def test_julia_matrix_assign_to_more(): + # assigning to Symbol or MatrixSymbol requires lhs/rhs match + A = Matrix([[1, 2, 3]]) + B = MatrixSymbol('B', 1, 3) + C = MatrixSymbol('C', 2, 3) + assert julia_code(A, assign_to=B) == "B = [1 2 3]" + raises(ValueError, lambda: julia_code(A, assign_to=x)) + raises(ValueError, lambda: julia_code(A, assign_to=C)) + + +def test_julia_matrix_1x1(): + A = Matrix([[3]]) + B = MatrixSymbol('B', 1, 1) + C = MatrixSymbol('C', 1, 2) + assert julia_code(A, assign_to=B) == "B = [3]" + # FIXME? + #assert julia_code(A, assign_to=x) == "x = [3]" + raises(ValueError, lambda: julia_code(A, assign_to=C)) + + +def test_julia_matrix_elements(): + A = Matrix([[x, 2, x*y]]) + assert julia_code(A[0, 0]**2 + A[0, 1] + A[0, 2]) == "x .^ 2 + x .* y + 2" + A = MatrixSymbol('AA', 1, 3) + assert julia_code(A) == "AA" + assert julia_code(A[0, 0]**2 + sin(A[0,1]) + A[0,2]) == \ + "sin(AA[1,2]) + AA[1,1] .^ 2 + AA[1,3]" + assert julia_code(sum(A)) == "AA[1,1] + AA[1,2] + AA[1,3]" + + +def test_julia_boolean(): + assert julia_code(True) == "true" + assert julia_code(S.true) == "true" + assert julia_code(False) == "false" + assert julia_code(S.false) == "false" + + +def test_julia_not_supported(): + with raises(NotImplementedError): + julia_code(S.ComplexInfinity) + + f = Function('f') + assert julia_code(f(x).diff(x), strict=False) == ( + "# Not supported in Julia:\n" + "# Derivative\n" + "Derivative(f(x), x)" + ) + + +def test_trick_indent_with_end_else_words(): + # words starting with "end" or "else" do not confuse the indenter + t1 = S('endless') + t2 = S('elsewhere') + pw = Piecewise((t1, x < 0), (t2, x <= 1), (1, True)) + assert julia_code(pw, inline=False) == ( + "if (x < 0)\n" + " endless\n" + "elseif (x <= 1)\n" + " elsewhere\n" + "else\n" + " 1\n" + "end") + + +def test_haramard(): + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + v = MatrixSymbol('v', 3, 1) + h = MatrixSymbol('h', 1, 3) + C = HadamardProduct(A, B) + assert julia_code(C) == "A .* B" + assert julia_code(C*v) == "(A .* B) * v" + assert julia_code(h*C*v) == "h * (A .* B) * v" + assert julia_code(C*A) == "(A .* B) * A" + # mixing Hadamard and scalar strange b/c we vectorize scalars + assert julia_code(C*x*y) == "(x .* y) * (A .* B)" + + +def test_sparse(): + M = SparseMatrix(5, 6, {}) + M[2, 2] = 10 + M[1, 2] = 20 + M[1, 3] = 22 + M[0, 3] = 30 + M[3, 0] = x*y + assert julia_code(M) == ( + "sparse([4, 2, 3, 1, 2], [1, 3, 3, 4, 4], [x .* y, 20, 10, 30, 22], 5, 6)" + ) + + +def test_specfun(): + n = Symbol('n') + for f in [besselj, bessely, besseli, besselk]: + assert julia_code(f(n, x)) == f.__name__ + '(n, x)' + for f in [airyai, airyaiprime, airybi, airybiprime]: + assert julia_code(f(x)) == f.__name__ + '(x)' + assert julia_code(hankel1(n, x)) == 'hankelh1(n, x)' + assert julia_code(hankel2(n, x)) == 'hankelh2(n, x)' + assert julia_code(jn(n, x)) == 'sqrt(2) * sqrt(pi) * sqrt(1 ./ x) .* besselj(n + 1 // 2, x) / 2' + assert julia_code(yn(n, x)) == 'sqrt(2) * sqrt(pi) * sqrt(1 ./ x) .* bessely(n + 1 // 2, x) / 2' + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(julia_code(A[0, 0]) == "A[1,1]") + assert(julia_code(3 * A[0, 0]) == "3 * A[1,1]") + + F = C[0, 0].subs(C, A - B) + assert(julia_code(F) == "(A - B)[1,1]") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_lambdarepr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_lambdarepr.py new file mode 100644 index 0000000000000000000000000000000000000000..94e09ada7a9ce7d01667edd8fc6ec35ebfbb9639 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_lambdarepr.py @@ -0,0 +1,246 @@ +from sympy.concrete.summations import Sum +from sympy.core.expr import Expr +from sympy.core.symbol import symbols +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin +from sympy.matrices.dense import MutableDenseMatrix as Matrix +from sympy.sets.sets import Interval +from sympy.utilities.lambdify import lambdify +from sympy.testing.pytest import raises + +from sympy.printing.tensorflow import TensorflowPrinter +from sympy.printing.lambdarepr import lambdarepr, LambdaPrinter, NumExprPrinter + + +x, y, z = symbols("x,y,z") +i, a, b = symbols("i,a,b") +j, c, d = symbols("j,c,d") + + +def test_basic(): + assert lambdarepr(x*y) == "x*y" + assert lambdarepr(x + y) in ["y + x", "x + y"] + assert lambdarepr(x**y) == "x**y" + + +def test_matrix(): + # Test printing a Matrix that has an element that is printed differently + # with the LambdaPrinter than with the StrPrinter. + e = x % 2 + assert lambdarepr(e) != str(e) + assert lambdarepr(Matrix([e])) == 'ImmutableDenseMatrix([[x % 2]])' + + +def test_piecewise(): + # In each case, test eval() the lambdarepr() to make sure there are a + # correct number of parentheses. It will give a SyntaxError if there aren't. + + h = "lambda x: " + + p = Piecewise((x, x < 0)) + l = lambdarepr(p) + eval(h + l) + assert l == "((x) if (x < 0) else None)" + + p = Piecewise( + (1, x < 1), + (2, x < 2), + (0, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((1) if (x < 1) else (2) if (x < 2) else (0))" + + p = Piecewise( + (1, x < 1), + (2, x < 2), + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((1) if (x < 1) else (2) if (x < 2) else None)" + + p = Piecewise( + (x, x < 1), + (x**2, Interval(3, 4, True, False).contains(x)), + (0, True), + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((x) if (x < 1) else (x**2) if (((x <= 4)) and ((x > 3))) else (0))" + + p = Piecewise( + (x**2, x < 0), + (x, x < 1), + (2 - x, x >= 1), + (0, True), evaluate=False + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((x**2) if (x < 0) else (x) if (x < 1)"\ + " else (2 - x) if (x >= 1) else (0))" + + p = Piecewise( + (x**2, x < 0), + (x, x < 1), + (2 - x, x >= 1), evaluate=False + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((x**2) if (x < 0) else (x) if (x < 1)"\ + " else (2 - x) if (x >= 1) else None)" + + p = Piecewise( + (1, x >= 1), + (2, x >= 2), + (3, x >= 3), + (4, x >= 4), + (5, x >= 5), + (6, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((1) if (x >= 1) else (2) if (x >= 2) else (3) if (x >= 3)"\ + " else (4) if (x >= 4) else (5) if (x >= 5) else (6))" + + p = Piecewise( + (1, x <= 1), + (2, x <= 2), + (3, x <= 3), + (4, x <= 4), + (5, x <= 5), + (6, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((1) if (x <= 1) else (2) if (x <= 2) else (3) if (x <= 3)"\ + " else (4) if (x <= 4) else (5) if (x <= 5) else (6))" + + p = Piecewise( + (1, x > 1), + (2, x > 2), + (3, x > 3), + (4, x > 4), + (5, x > 5), + (6, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l =="((1) if (x > 1) else (2) if (x > 2) else (3) if (x > 3)"\ + " else (4) if (x > 4) else (5) if (x > 5) else (6))" + + p = Piecewise( + (1, x < 1), + (2, x < 2), + (3, x < 3), + (4, x < 4), + (5, x < 5), + (6, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((1) if (x < 1) else (2) if (x < 2) else (3) if (x < 3)"\ + " else (4) if (x < 4) else (5) if (x < 5) else (6))" + + p = Piecewise( + (Piecewise( + (1, x > 0), + (2, True) + ), y > 0), + (3, True) + ) + l = lambdarepr(p) + eval(h + l) + assert l == "((((1) if (x > 0) else (2))) if (y > 0) else (3))" + + +def test_sum__1(): + # In each case, test eval() the lambdarepr() to make sure that + # it evaluates to the same results as the symbolic expression + s = Sum(x ** i, (i, a, b)) + l = lambdarepr(s) + assert l == "(builtins.sum(x**i for i in range(a, b+1)))" + + args = x, a, b + f = lambdify(args, s) + v = 2, 3, 8 + assert f(*v) == s.subs(zip(args, v)).doit() + +def test_sum__2(): + s = Sum(i * x, (i, a, b)) + l = lambdarepr(s) + assert l == "(builtins.sum(i*x for i in range(a, b+1)))" + + args = x, a, b + f = lambdify(args, s) + v = 2, 3, 8 + assert f(*v) == s.subs(zip(args, v)).doit() + + +def test_multiple_sums(): + s = Sum(i * x + j, (i, a, b), (j, c, d)) + + l = lambdarepr(s) + assert l == "(builtins.sum(i*x + j for j in range(c, d+1) for i in range(a, b+1)))" + + args = x, a, b, c, d + f = lambdify(args, s) + vals = 2, 3, 4, 5, 6 + f_ref = s.subs(zip(args, vals)).doit() + f_res = f(*vals) + assert f_res == f_ref + + +def test_sqrt(): + prntr = LambdaPrinter({'standard' : 'python3'}) + assert prntr._print_Pow(sqrt(x), rational=False) == 'sqrt(x)' + assert prntr._print_Pow(sqrt(x), rational=True) == 'x**(1/2)' + + +def test_settings(): + raises(TypeError, lambda: lambdarepr(sin(x), method="garbage")) + + +def test_numexpr(): + # test ITE rewrite as Piecewise + from sympy.logic.boolalg import ITE + expr = ITE(x > 0, True, False, evaluate=False) + assert NumExprPrinter().doprint(expr) == \ + "numexpr.evaluate('where((x > 0), True, False)', truediv=True)" + + from sympy.codegen.ast import Return, FunctionDefinition, Variable, Assignment + func_def = FunctionDefinition(None, 'foo', [Variable(x)], [Assignment(y,x), Return(y**2)]) + expected = "def foo(x):\n"\ + " y = numexpr.evaluate('x', truediv=True)\n"\ + " return numexpr.evaluate('y**2', truediv=True)" + assert NumExprPrinter().doprint(func_def) == expected + + +class CustomPrintedObject(Expr): + def _lambdacode(self, printer): + return 'lambda' + + def _tensorflowcode(self, printer): + return 'tensorflow' + + def _numpycode(self, printer): + return 'numpy' + + def _numexprcode(self, printer): + return 'numexpr' + + def _mpmathcode(self, printer): + return 'mpmath' + + +def test_printmethod(): + # In each case, printmethod is called to test + # its working + + obj = CustomPrintedObject() + assert LambdaPrinter().doprint(obj) == 'lambda' + assert TensorflowPrinter().doprint(obj) == 'tensorflow' + assert NumExprPrinter().doprint(obj) == "numexpr.evaluate('numexpr', truediv=True)" + + assert NumExprPrinter().doprint(Piecewise((y, x >= 0), (z, x < 0))) == \ + "numexpr.evaluate('where((x >= 0), y, z)', truediv=True)" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_latex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_latex.py new file mode 100644 index 0000000000000000000000000000000000000000..063611d09a923881cd94bd693f3f3f721535fd0c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_latex.py @@ -0,0 +1,3164 @@ +from sympy import MatAdd, MatMul, Array +from sympy.algebras.quaternion import Quaternion +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.combinatorics.permutations import Cycle, Permutation, AppliedPermutation +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.containers import Tuple, Dict +from sympy.core.expr import UnevaluatedExpr +from sympy.core.function import (Derivative, Function, Lambda, Subs, diff) +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core.numbers import (AlgebraicNumber, Float, I, Integer, Rational, oo, pi) +from sympy.core.parameters import evaluate +from sympy.core.power import Pow +from sympy.core.relational import Eq, Ne +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.functions.combinatorial.factorials import (FallingFactorial, RisingFactorial, binomial, factorial, factorial2, subfactorial) +from sympy.functions.combinatorial.numbers import (bernoulli, bell, catalan, euler, genocchi, + lucas, fibonacci, tribonacci, divisor_sigma, udivisor_sigma, + mobius, primenu, primeomega, + totient, reduced_totient) +from sympy.functions.elementary.complexes import (Abs, arg, conjugate, im, polar_lift, re) +from sympy.functions.elementary.exponential import (LambertW, exp, log) +from sympy.functions.elementary.hyperbolic import (asinh, coth) +from sympy.functions.elementary.integers import (ceiling, floor, frac) +from sympy.functions.elementary.miscellaneous import (Max, Min, root, sqrt) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acsc, asin, cos, cot, sin, tan) +from sympy.functions.special.beta_functions import beta +from sympy.functions.special.delta_functions import (DiracDelta, Heaviside) +from sympy.functions.special.elliptic_integrals import (elliptic_e, elliptic_f, elliptic_k, elliptic_pi) +from sympy.functions.special.error_functions import (Chi, Ci, Ei, Shi, Si, expint) +from sympy.functions.special.gamma_functions import (gamma, uppergamma) +from sympy.functions.special.hyper import (hyper, meijerg) +from sympy.functions.special.mathieu_functions import (mathieuc, mathieucprime, mathieus, mathieusprime) +from sympy.functions.special.polynomials import (assoc_laguerre, assoc_legendre, chebyshevt, chebyshevu, gegenbauer, hermite, jacobi, laguerre, legendre) +from sympy.functions.special.singularity_functions import SingularityFunction +from sympy.functions.special.spherical_harmonics import (Ynm, Znm) +from sympy.functions.special.tensor_functions import (KroneckerDelta, LeviCivita) +from sympy.functions.special.zeta_functions import (dirichlet_eta, lerchphi, polylog, stieltjes, zeta) +from sympy.integrals.integrals import Integral +from sympy.integrals.transforms import (CosineTransform, FourierTransform, InverseCosineTransform, InverseFourierTransform, InverseLaplaceTransform, InverseMellinTransform, InverseSineTransform, LaplaceTransform, MellinTransform, SineTransform) +from sympy.logic import Implies +from sympy.logic.boolalg import (And, Or, Xor, Equivalent, false, Not, true) +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.kronecker import KroneckerProduct +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.permutation import PermutationMatrix +from sympy.matrices.expressions.slice import MatrixSlice +from sympy.matrices.expressions.dotproduct import DotProduct +from sympy.physics.control.lti import TransferFunction, Series, Parallel, Feedback, TransferFunctionMatrix, MIMOSeries, MIMOParallel, MIMOFeedback +from sympy.physics.quantum import Commutator, Operator +from sympy.physics.quantum.trace import Tr +from sympy.physics.units import meter, gibibyte, gram, microgram, second, milli, micro +from sympy.polys.domains.integerring import ZZ +from sympy.polys.fields import field +from sympy.polys.polytools import Poly +from sympy.polys.rings import ring +from sympy.polys.rootoftools import (RootSum, rootof) +from sympy.series.formal import fps +from sympy.series.fourier import fourier_series +from sympy.series.limits import Limit +from sympy.series.order import Order +from sympy.series.sequences import (SeqAdd, SeqFormula, SeqMul, SeqPer) +from sympy.sets.conditionset import ConditionSet +from sympy.sets.contains import Contains +from sympy.sets.fancysets import (ComplexRegion, ImageSet, Range) +from sympy.sets.ordinals import Ordinal, OrdinalOmega, OmegaPower +from sympy.sets.powerset import PowerSet +from sympy.sets.sets import (FiniteSet, Interval, Union, Intersection, Complement, SymmetricDifference, ProductSet) +from sympy.sets.setexpr import SetExpr +from sympy.stats.crv_types import Normal +from sympy.stats.symbolic_probability import (Covariance, Expectation, + Probability, Variance) +from sympy.tensor.array import (ImmutableDenseNDimArray, + ImmutableSparseNDimArray, + MutableSparseNDimArray, + MutableDenseNDimArray, + tensorproduct) +from sympy.tensor.array.expressions.array_expressions import ArraySymbol, ArrayElement +from sympy.tensor.indexed import (Idx, Indexed, IndexedBase) +from sympy.tensor.toperators import PartialDerivative +from sympy.vector import CoordSys3D, Cross, Curl, Dot, Divergence, Gradient, Laplacian + + +from sympy.testing.pytest import (XFAIL, raises, _both_exp_pow, + warns_deprecated_sympy) +from sympy.printing.latex import (latex, translate, greek_letters_set, + tex_greek_dictionary, multiline_latex, + latex_escape, LatexPrinter) + +import sympy as sym + +from sympy.abc import mu, tau + + +class lowergamma(sym.lowergamma): + pass # testing notation inheritance by a subclass with same name + + +x, y, z, t, w, a, b, c, s, p = symbols('x y z t w a b c s p') +k, m, n = symbols('k m n', integer=True) + + +def test_printmethod(): + class R(Abs): + def _latex(self, printer): + return "foo(%s)" % printer._print(self.args[0]) + assert latex(R(x)) == r"foo(x)" + + class R(Abs): + def _latex(self, printer): + return "foo" + assert latex(R(x)) == r"foo" + + +def test_latex_basic(): + assert latex(1 + x) == r"x + 1" + assert latex(x**2) == r"x^{2}" + assert latex(x**(1 + x)) == r"x^{x + 1}" + assert latex(x**3 + x + 1 + x**2) == r"x^{3} + x^{2} + x + 1" + + assert latex(2*x*y) == r"2 x y" + assert latex(2*x*y, mul_symbol='dot') == r"2 \cdot x \cdot y" + assert latex(3*x**2*y, mul_symbol='\\,') == r"3\,x^{2}\,y" + assert latex(1.5*3**x, mul_symbol='\\,') == r"1.5 \cdot 3^{x}" + + assert latex(x**S.Half**5) == r"\sqrt[32]{x}" + assert latex(Mul(S.Half, x**2, -5, evaluate=False)) == r"\frac{1}{2} x^{2} \left(-5\right)" + assert latex(Mul(S.Half, x**2, 5, evaluate=False)) == r"\frac{1}{2} x^{2} \cdot 5" + assert latex(Mul(-5, -5, evaluate=False)) == r"\left(-5\right) \left(-5\right)" + assert latex(Mul(5, -5, evaluate=False)) == r"5 \left(-5\right)" + assert latex(Mul(S.Half, -5, S.Half, evaluate=False)) == r"\frac{1}{2} \left(-5\right) \frac{1}{2}" + assert latex(Mul(5, I, 5, evaluate=False)) == r"5 i 5" + assert latex(Mul(5, I, -5, evaluate=False)) == r"5 i \left(-5\right)" + assert latex(Mul(Pow(x, 2), S.Half*x + 1)) == r"x^{2} \left(\frac{x}{2} + 1\right)" + assert latex(Mul(Pow(x, 3), Rational(2, 3)*x + 1)) == r"x^{3} \left(\frac{2 x}{3} + 1\right)" + assert latex(Mul(Pow(x, 11), 2*x + 1)) == r"x^{11} \left(2 x + 1\right)" + + assert latex(Mul(0, 1, evaluate=False)) == r'0 \cdot 1' + assert latex(Mul(1, 0, evaluate=False)) == r'1 \cdot 0' + assert latex(Mul(1, 1, evaluate=False)) == r'1 \cdot 1' + assert latex(Mul(-1, 1, evaluate=False)) == r'\left(-1\right) 1' + assert latex(Mul(1, 1, 1, evaluate=False)) == r'1 \cdot 1 \cdot 1' + assert latex(Mul(1, 2, evaluate=False)) == r'1 \cdot 2' + assert latex(Mul(1, S.Half, evaluate=False)) == r'1 \cdot \frac{1}{2}' + assert latex(Mul(1, 1, S.Half, evaluate=False)) == \ + r'1 \cdot 1 \cdot \frac{1}{2}' + assert latex(Mul(1, 1, 2, 3, x, evaluate=False)) == \ + r'1 \cdot 1 \cdot 2 \cdot 3 x' + assert latex(Mul(1, -1, evaluate=False)) == r'1 \left(-1\right)' + assert latex(Mul(4, 3, 2, 1, 0, y, x, evaluate=False)) == \ + r'4 \cdot 3 \cdot 2 \cdot 1 \cdot 0 y x' + assert latex(Mul(4, 3, 2, 1+z, 0, y, x, evaluate=False)) == \ + r'4 \cdot 3 \cdot 2 \left(z + 1\right) 0 y x' + assert latex(Mul(Rational(2, 3), Rational(5, 7), evaluate=False)) == \ + r'\frac{2}{3} \cdot \frac{5}{7}' + + assert latex(1/x) == r"\frac{1}{x}" + assert latex(1/x, fold_short_frac=True) == r"1 / x" + assert latex(-S(3)/2) == r"- \frac{3}{2}" + assert latex(-S(3)/2, fold_short_frac=True) == r"- 3 / 2" + assert latex(1/x**2) == r"\frac{1}{x^{2}}" + assert latex(1/(x + y)/2) == r"\frac{1}{2 \left(x + y\right)}" + assert latex(x/2) == r"\frac{x}{2}" + assert latex(x/2, fold_short_frac=True) == r"x / 2" + assert latex((x + y)/(2*x)) == r"\frac{x + y}{2 x}" + assert latex((x + y)/(2*x), fold_short_frac=True) == \ + r"\left(x + y\right) / 2 x" + assert latex((x + y)/(2*x), long_frac_ratio=0) == \ + r"\frac{1}{2 x} \left(x + y\right)" + assert latex((x + y)/x) == r"\frac{x + y}{x}" + assert latex((x + y)/x, long_frac_ratio=3) == r"\frac{x + y}{x}" + assert latex((2*sqrt(2)*x)/3) == r"\frac{2 \sqrt{2} x}{3}" + assert latex((2*sqrt(2)*x)/3, long_frac_ratio=2) == \ + r"\frac{2 x}{3} \sqrt{2}" + assert latex(binomial(x, y)) == r"{\binom{x}{y}}" + + x_star = Symbol('x^*') + f = Function('f') + assert latex(x_star**2) == r"\left(x^{*}\right)^{2}" + assert latex(x_star**2, parenthesize_super=False) == r"{x^{*}}^{2}" + assert latex(Derivative(f(x_star), x_star,2)) == r"\frac{d^{2}}{d \left(x^{*}\right)^{2}} f{\left(x^{*} \right)}" + assert latex(Derivative(f(x_star), x_star,2), parenthesize_super=False) == r"\frac{d^{2}}{d {x^{*}}^{2}} f{\left(x^{*} \right)}" + + assert latex(2*Integral(x, x)/3) == r"\frac{2 \int x\, dx}{3}" + assert latex(2*Integral(x, x)/3, fold_short_frac=True) == \ + r"\left(2 \int x\, dx\right) / 3" + + assert latex(sqrt(x)) == r"\sqrt{x}" + assert latex(x**Rational(1, 3)) == r"\sqrt[3]{x}" + assert latex(x**Rational(1, 3), root_notation=False) == r"x^{\frac{1}{3}}" + assert latex(sqrt(x)**3) == r"x^{\frac{3}{2}}" + assert latex(sqrt(x), itex=True) == r"\sqrt{x}" + assert latex(x**Rational(1, 3), itex=True) == r"\root{3}{x}" + assert latex(sqrt(x)**3, itex=True) == r"x^{\frac{3}{2}}" + assert latex(x**Rational(3, 4)) == r"x^{\frac{3}{4}}" + assert latex(x**Rational(3, 4), fold_frac_powers=True) == r"x^{3/4}" + assert latex((x + 1)**Rational(3, 4)) == \ + r"\left(x + 1\right)^{\frac{3}{4}}" + assert latex((x + 1)**Rational(3, 4), fold_frac_powers=True) == \ + r"\left(x + 1\right)^{3/4}" + assert latex(AlgebraicNumber(sqrt(2))) == r"\sqrt{2}" + assert latex(AlgebraicNumber(sqrt(2), [3, -7])) == r"-7 + 3 \sqrt{2}" + assert latex(AlgebraicNumber(sqrt(2), alias='alpha')) == r"\alpha" + assert latex(AlgebraicNumber(sqrt(2), [3, -7], alias='alpha')) == \ + r"3 \alpha - 7" + assert latex(AlgebraicNumber(2**(S(1)/3), [1, 3, -7], alias='beta')) == \ + r"\beta^{2} + 3 \beta - 7" + + k = ZZ.cyclotomic_field(5) + assert latex(k.ext.field_element([1, 2, 3, 4])) == \ + r"\zeta^{3} + 2 \zeta^{2} + 3 \zeta + 4" + assert latex(k.ext.field_element([1, 2, 3, 4]), order='old') == \ + r"4 + 3 \zeta + 2 \zeta^{2} + \zeta^{3}" + assert latex(k.primes_above(19)[0]) == \ + r"\left(19, \zeta^{2} + 5 \zeta + 1\right)" + assert latex(k.primes_above(19)[0], order='old') == \ + r"\left(19, 1 + 5 \zeta + \zeta^{2}\right)" + assert latex(k.primes_above(7)[0]) == r"\left(7\right)" + + assert latex(1.5e20*x) == r"1.5 \cdot 10^{20} x" + assert latex(1.5e20*x, mul_symbol='dot') == r"1.5 \cdot 10^{20} \cdot x" + assert latex(1.5e20*x, mul_symbol='times') == \ + r"1.5 \times 10^{20} \times x" + + assert latex(1/sin(x)) == r"\frac{1}{\sin{\left(x \right)}}" + assert latex(sin(x)**-1) == r"\frac{1}{\sin{\left(x \right)}}" + assert latex(sin(x)**Rational(3, 2)) == \ + r"\sin^{\frac{3}{2}}{\left(x \right)}" + assert latex(sin(x)**Rational(3, 2), fold_frac_powers=True) == \ + r"\sin^{3/2}{\left(x \right)}" + + assert latex(~x) == r"\neg x" + assert latex(x & y) == r"x \wedge y" + assert latex(x & y & z) == r"x \wedge y \wedge z" + assert latex(x | y) == r"x \vee y" + assert latex(x | y | z) == r"x \vee y \vee z" + assert latex((x & y) | z) == r"z \vee \left(x \wedge y\right)" + assert latex(Implies(x, y)) == r"x \Rightarrow y" + assert latex(~(x >> ~y)) == r"x \not\Rightarrow \neg y" + assert latex(Implies(Or(x,y), z)) == r"\left(x \vee y\right) \Rightarrow z" + assert latex(Implies(z, Or(x,y))) == r"z \Rightarrow \left(x \vee y\right)" + assert latex(~(x & y)) == r"\neg \left(x \wedge y\right)" + + assert latex(~x, symbol_names={x: "x_i"}) == r"\neg x_i" + assert latex(x & y, symbol_names={x: "x_i", y: "y_i"}) == \ + r"x_i \wedge y_i" + assert latex(x & y & z, symbol_names={x: "x_i", y: "y_i", z: "z_i"}) == \ + r"x_i \wedge y_i \wedge z_i" + assert latex(x | y, symbol_names={x: "x_i", y: "y_i"}) == r"x_i \vee y_i" + assert latex(x | y | z, symbol_names={x: "x_i", y: "y_i", z: "z_i"}) == \ + r"x_i \vee y_i \vee z_i" + assert latex((x & y) | z, symbol_names={x: "x_i", y: "y_i", z: "z_i"}) == \ + r"z_i \vee \left(x_i \wedge y_i\right)" + assert latex(Implies(x, y), symbol_names={x: "x_i", y: "y_i"}) == \ + r"x_i \Rightarrow y_i" + assert latex(Pow(Rational(1, 3), -1, evaluate=False)) == r"\frac{1}{\frac{1}{3}}" + assert latex(Pow(Rational(1, 3), -2, evaluate=False)) == r"\frac{1}{(\frac{1}{3})^{2}}" + assert latex(Pow(Integer(1)/100, -1, evaluate=False)) == r"\frac{1}{\frac{1}{100}}" + + p = Symbol('p', positive=True) + assert latex(exp(-p)*log(p)) == r"e^{- p} \log{\left(p \right)}" + + assert latex(Pow(Rational(2, 3), -1, evaluate=False)) == r'\frac{1}{\frac{2}{3}}' + assert latex(Pow(Rational(4, 3), -1, evaluate=False)) == r'\frac{1}{\frac{4}{3}}' + assert latex(Pow(Rational(-3, 4), -1, evaluate=False)) == r'\frac{1}{- \frac{3}{4}}' + assert latex(Pow(Rational(-4, 4), -1, evaluate=False)) == r'\frac{1}{-1}' + assert latex(Pow(Rational(1, 3), -1, evaluate=False)) == r'\frac{1}{\frac{1}{3}}' + assert latex(Pow(Rational(-1, 3), -1, evaluate=False)) == r'\frac{1}{- \frac{1}{3}}' + + +def test_latex_builtins(): + assert latex(True) == r"\text{True}" + assert latex(False) == r"\text{False}" + assert latex(None) == r"\text{None}" + assert latex(true) == r"\text{True}" + assert latex(false) == r'\text{False}' + + +def test_latex_SingularityFunction(): + assert latex(SingularityFunction(x, 4, 5)) == \ + r"{\left\langle x - 4 \right\rangle}^{5}" + assert latex(SingularityFunction(x, -3, 4)) == \ + r"{\left\langle x + 3 \right\rangle}^{4}" + assert latex(SingularityFunction(x, 0, 4)) == \ + r"{\left\langle x \right\rangle}^{4}" + assert latex(SingularityFunction(x, a, n)) == \ + r"{\left\langle - a + x \right\rangle}^{n}" + assert latex(SingularityFunction(x, 4, -2)) == \ + r"{\left\langle x - 4 \right\rangle}^{-2}" + assert latex(SingularityFunction(x, 4, -1)) == \ + r"{\left\langle x - 4 \right\rangle}^{-1}" + + assert latex(SingularityFunction(x, 4, 5)**3) == \ + r"{\left({\langle x - 4 \rangle}^{5}\right)}^{3}" + assert latex(SingularityFunction(x, -3, 4)**3) == \ + r"{\left({\langle x + 3 \rangle}^{4}\right)}^{3}" + assert latex(SingularityFunction(x, 0, 4)**3) == \ + r"{\left({\langle x \rangle}^{4}\right)}^{3}" + assert latex(SingularityFunction(x, a, n)**3) == \ + r"{\left({\langle - a + x \rangle}^{n}\right)}^{3}" + assert latex(SingularityFunction(x, 4, -2)**3) == \ + r"{\left({\langle x - 4 \rangle}^{-2}\right)}^{3}" + assert latex((SingularityFunction(x, 4, -1)**3)**3) == \ + r"{\left({\langle x - 4 \rangle}^{-1}\right)}^{9}" + + +def test_latex_cycle(): + assert latex(Cycle(1, 2, 4)) == r"\left( 1\; 2\; 4\right)" + assert latex(Cycle(1, 2)(4, 5, 6)) == \ + r"\left( 1\; 2\right)\left( 4\; 5\; 6\right)" + assert latex(Cycle()) == r"\left( \right)" + + +def test_latex_permutation(): + assert latex(Permutation(1, 2, 4)) == r"\left( 1\; 2\; 4\right)" + assert latex(Permutation(1, 2)(4, 5, 6)) == \ + r"\left( 1\; 2\right)\left( 4\; 5\; 6\right)" + assert latex(Permutation()) == r"\left( \right)" + assert latex(Permutation(2, 4)*Permutation(5)) == \ + r"\left( 2\; 4\right)\left( 5\right)" + assert latex(Permutation(5)) == r"\left( 5\right)" + + assert latex(Permutation(0, 1), perm_cyclic=False) == \ + r"\begin{pmatrix} 0 & 1 \\ 1 & 0 \end{pmatrix}" + assert latex(Permutation(0, 1)(2, 3), perm_cyclic=False) == \ + r"\begin{pmatrix} 0 & 1 & 2 & 3 \\ 1 & 0 & 3 & 2 \end{pmatrix}" + assert latex(Permutation(), perm_cyclic=False) == \ + r"\left( \right)" + + with warns_deprecated_sympy(): + old_print_cyclic = Permutation.print_cyclic + Permutation.print_cyclic = False + assert latex(Permutation(0, 1)(2, 3)) == \ + r"\begin{pmatrix} 0 & 1 & 2 & 3 \\ 1 & 0 & 3 & 2 \end{pmatrix}" + Permutation.print_cyclic = old_print_cyclic + +def test_latex_Float(): + assert latex(Float(1.0e100)) == r"1.0 \cdot 10^{100}" + assert latex(Float(1.0e-100)) == r"1.0 \cdot 10^{-100}" + assert latex(Float(1.0e-100), mul_symbol="times") == \ + r"1.0 \times 10^{-100}" + assert latex(Float('10000.0'), full_prec=False, min=-2, max=2) == \ + r"1.0 \cdot 10^{4}" + assert latex(Float('10000.0'), full_prec=False, min=-2, max=4) == \ + r"1.0 \cdot 10^{4}" + assert latex(Float('10000.0'), full_prec=False, min=-2, max=5) == \ + r"10000.0" + assert latex(Float('0.099999'), full_prec=True, min=-2, max=5) == \ + r"9.99990000000000 \cdot 10^{-2}" + + +def test_latex_vector_expressions(): + A = CoordSys3D('A') + + assert latex(Cross(A.i, A.j*A.x*3+A.k)) == \ + r"\mathbf{\hat{i}_{A}} \times \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}} + \mathbf{\hat{k}_{A}}\right)" + assert latex(Cross(A.i, A.j)) == \ + r"\mathbf{\hat{i}_{A}} \times \mathbf{\hat{j}_{A}}" + assert latex(x*Cross(A.i, A.j)) == \ + r"x \left(\mathbf{\hat{i}_{A}} \times \mathbf{\hat{j}_{A}}\right)" + assert latex(Cross(x*A.i, A.j)) == \ + r'- \mathbf{\hat{j}_{A}} \times \left(\left(x\right)\mathbf{\hat{i}_{A}}\right)' + + assert latex(Curl(3*A.x*A.j)) == \ + r"\nabla\times \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)" + assert latex(Curl(3*A.x*A.j+A.i)) == \ + r"\nabla\times \left(\mathbf{\hat{i}_{A}} + \left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)" + assert latex(Curl(3*x*A.x*A.j)) == \ + r"\nabla\times \left(\left(3 \mathbf{{x}_{A}} x\right)\mathbf{\hat{j}_{A}}\right)" + assert latex(x*Curl(3*A.x*A.j)) == \ + r"x \left(\nabla\times \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)\right)" + + assert latex(Divergence(3*A.x*A.j+A.i)) == \ + r"\nabla\cdot \left(\mathbf{\hat{i}_{A}} + \left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)" + assert latex(Divergence(3*A.x*A.j)) == \ + r"\nabla\cdot \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)" + assert latex(x*Divergence(3*A.x*A.j)) == \ + r"x \left(\nabla\cdot \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}}\right)\right)" + + assert latex(Dot(A.i, A.j*A.x*3+A.k)) == \ + r"\mathbf{\hat{i}_{A}} \cdot \left(\left(3 \mathbf{{x}_{A}}\right)\mathbf{\hat{j}_{A}} + \mathbf{\hat{k}_{A}}\right)" + assert latex(Dot(A.i, A.j)) == \ + r"\mathbf{\hat{i}_{A}} \cdot \mathbf{\hat{j}_{A}}" + assert latex(Dot(x*A.i, A.j)) == \ + r"\mathbf{\hat{j}_{A}} \cdot \left(\left(x\right)\mathbf{\hat{i}_{A}}\right)" + assert latex(x*Dot(A.i, A.j)) == \ + r"x \left(\mathbf{\hat{i}_{A}} \cdot \mathbf{\hat{j}_{A}}\right)" + + assert latex(Gradient(A.x)) == r"\nabla \mathbf{{x}_{A}}" + assert latex(Gradient(A.x + 3*A.y)) == \ + r"\nabla \left(\mathbf{{x}_{A}} + 3 \mathbf{{y}_{A}}\right)" + assert latex(x*Gradient(A.x)) == r"x \left(\nabla \mathbf{{x}_{A}}\right)" + assert latex(Gradient(x*A.x)) == r"\nabla \left(\mathbf{{x}_{A}} x\right)" + + assert latex(Laplacian(A.x)) == r"\Delta \mathbf{{x}_{A}}" + assert latex(Laplacian(A.x + 3*A.y)) == \ + r"\Delta \left(\mathbf{{x}_{A}} + 3 \mathbf{{y}_{A}}\right)" + assert latex(x*Laplacian(A.x)) == r"x \left(\Delta \mathbf{{x}_{A}}\right)" + assert latex(Laplacian(x*A.x)) == r"\Delta \left(\mathbf{{x}_{A}} x\right)" + +def test_latex_symbols(): + Gamma, lmbda, rho = symbols('Gamma, lambda, rho') + tau, Tau, TAU, taU = symbols('tau, Tau, TAU, taU') + assert latex(tau) == r"\tau" + assert latex(Tau) == r"\mathrm{T}" + assert latex(TAU) == r"\tau" + assert latex(taU) == r"\tau" + # Check that all capitalized greek letters are handled explicitly + capitalized_letters = {l.capitalize() for l in greek_letters_set} + assert len(capitalized_letters - set(tex_greek_dictionary.keys())) == 0 + assert latex(Gamma + lmbda) == r"\Gamma + \lambda" + assert latex(Gamma * lmbda) == r"\Gamma \lambda" + assert latex(Symbol('q1')) == r"q_{1}" + assert latex(Symbol('q21')) == r"q_{21}" + assert latex(Symbol('epsilon0')) == r"\epsilon_{0}" + assert latex(Symbol('omega1')) == r"\omega_{1}" + assert latex(Symbol('91')) == r"91" + assert latex(Symbol('alpha_new')) == r"\alpha_{new}" + assert latex(Symbol('C^orig')) == r"C^{orig}" + assert latex(Symbol('x^alpha')) == r"x^{\alpha}" + assert latex(Symbol('beta^alpha')) == r"\beta^{\alpha}" + assert latex(Symbol('e^Alpha')) == r"e^{\mathrm{A}}" + assert latex(Symbol('omega_alpha^beta')) == r"\omega^{\beta}_{\alpha}" + assert latex(Symbol('omega') ** Symbol('beta')) == r"\omega^{\beta}" + + +@XFAIL +def test_latex_symbols_failing(): + rho, mass, volume = symbols('rho, mass, volume') + assert latex( + volume * rho == mass) == r"\rho \mathrm{volume} = \mathrm{mass}" + assert latex(volume / mass * rho == 1) == \ + r"\rho \mathrm{volume} {\mathrm{mass}}^{(-1)} = 1" + assert latex(mass**3 * volume**3) == \ + r"{\mathrm{mass}}^{3} \cdot {\mathrm{volume}}^{3}" + + +@_both_exp_pow +def test_latex_functions(): + assert latex(exp(x)) == r"e^{x}" + assert latex(exp(1) + exp(2)) == r"e + e^{2}" + + f = Function('f') + assert latex(f(x)) == r'f{\left(x \right)}' + assert latex(f) == r'f' + + g = Function('g') + assert latex(g(x, y)) == r'g{\left(x,y \right)}' + assert latex(g) == r'g' + + h = Function('h') + assert latex(h(x, y, z)) == r'h{\left(x,y,z \right)}' + assert latex(h) == r'h' + + Li = Function('Li') + assert latex(Li) == r'\operatorname{Li}' + assert latex(Li(x)) == r'\operatorname{Li}{\left(x \right)}' + + mybeta = Function('beta') + # not to be confused with the beta function + assert latex(mybeta(x, y, z)) == r"\beta{\left(x,y,z \right)}" + assert latex(beta(x, y)) == r'\operatorname{B}\left(x, y\right)' + assert latex(beta(x, evaluate=False)) == r'\operatorname{B}\left(x, x\right)' + assert latex(beta(x, y)**2) == r'\operatorname{B}^{2}\left(x, y\right)' + assert latex(mybeta(x)) == r"\beta{\left(x \right)}" + assert latex(mybeta) == r"\beta" + + g = Function('gamma') + # not to be confused with the gamma function + assert latex(g(x, y, z)) == r"\gamma{\left(x,y,z \right)}" + assert latex(g(x)) == r"\gamma{\left(x \right)}" + assert latex(g) == r"\gamma" + + a_1 = Function('a_1') + assert latex(a_1) == r"a_{1}" + assert latex(a_1(x)) == r"a_{1}{\left(x \right)}" + assert latex(Function('a_1')) == r"a_{1}" + + # Issue #16925 + # multi letter function names + # > simple + assert latex(Function('ab')) == r"\operatorname{ab}" + assert latex(Function('ab1')) == r"\operatorname{ab}_{1}" + assert latex(Function('ab12')) == r"\operatorname{ab}_{12}" + assert latex(Function('ab_1')) == r"\operatorname{ab}_{1}" + assert latex(Function('ab_12')) == r"\operatorname{ab}_{12}" + assert latex(Function('ab_c')) == r"\operatorname{ab}_{c}" + assert latex(Function('ab_cd')) == r"\operatorname{ab}_{cd}" + # > with argument + assert latex(Function('ab')(Symbol('x'))) == r"\operatorname{ab}{\left(x \right)}" + assert latex(Function('ab1')(Symbol('x'))) == r"\operatorname{ab}_{1}{\left(x \right)}" + assert latex(Function('ab12')(Symbol('x'))) == r"\operatorname{ab}_{12}{\left(x \right)}" + assert latex(Function('ab_1')(Symbol('x'))) == r"\operatorname{ab}_{1}{\left(x \right)}" + assert latex(Function('ab_c')(Symbol('x'))) == r"\operatorname{ab}_{c}{\left(x \right)}" + assert latex(Function('ab_cd')(Symbol('x'))) == r"\operatorname{ab}_{cd}{\left(x \right)}" + + # > with power + # does not work on functions without brackets + + # > with argument and power combined + assert latex(Function('ab')()**2) == r"\operatorname{ab}^{2}{\left( \right)}" + assert latex(Function('ab1')()**2) == r"\operatorname{ab}_{1}^{2}{\left( \right)}" + assert latex(Function('ab12')()**2) == r"\operatorname{ab}_{12}^{2}{\left( \right)}" + assert latex(Function('ab_1')()**2) == r"\operatorname{ab}_{1}^{2}{\left( \right)}" + assert latex(Function('ab_12')()**2) == r"\operatorname{ab}_{12}^{2}{\left( \right)}" + assert latex(Function('ab')(Symbol('x'))**2) == r"\operatorname{ab}^{2}{\left(x \right)}" + assert latex(Function('ab1')(Symbol('x'))**2) == r"\operatorname{ab}_{1}^{2}{\left(x \right)}" + assert latex(Function('ab12')(Symbol('x'))**2) == r"\operatorname{ab}_{12}^{2}{\left(x \right)}" + assert latex(Function('ab_1')(Symbol('x'))**2) == r"\operatorname{ab}_{1}^{2}{\left(x \right)}" + assert latex(Function('ab_12')(Symbol('x'))**2) == \ + r"\operatorname{ab}_{12}^{2}{\left(x \right)}" + + # single letter function names + # > simple + assert latex(Function('a')) == r"a" + assert latex(Function('a1')) == r"a_{1}" + assert latex(Function('a12')) == r"a_{12}" + assert latex(Function('a_1')) == r"a_{1}" + assert latex(Function('a_12')) == r"a_{12}" + + # > with argument + assert latex(Function('a')()) == r"a{\left( \right)}" + assert latex(Function('a1')()) == r"a_{1}{\left( \right)}" + assert latex(Function('a12')()) == r"a_{12}{\left( \right)}" + assert latex(Function('a_1')()) == r"a_{1}{\left( \right)}" + assert latex(Function('a_12')()) == r"a_{12}{\left( \right)}" + + # > with power + # does not work on functions without brackets + + # > with argument and power combined + assert latex(Function('a')()**2) == r"a^{2}{\left( \right)}" + assert latex(Function('a1')()**2) == r"a_{1}^{2}{\left( \right)}" + assert latex(Function('a12')()**2) == r"a_{12}^{2}{\left( \right)}" + assert latex(Function('a_1')()**2) == r"a_{1}^{2}{\left( \right)}" + assert latex(Function('a_12')()**2) == r"a_{12}^{2}{\left( \right)}" + assert latex(Function('a')(Symbol('x'))**2) == r"a^{2}{\left(x \right)}" + assert latex(Function('a1')(Symbol('x'))**2) == r"a_{1}^{2}{\left(x \right)}" + assert latex(Function('a12')(Symbol('x'))**2) == r"a_{12}^{2}{\left(x \right)}" + assert latex(Function('a_1')(Symbol('x'))**2) == r"a_{1}^{2}{\left(x \right)}" + assert latex(Function('a_12')(Symbol('x'))**2) == r"a_{12}^{2}{\left(x \right)}" + + assert latex(Function('a')()**32) == r"a^{32}{\left( \right)}" + assert latex(Function('a1')()**32) == r"a_{1}^{32}{\left( \right)}" + assert latex(Function('a12')()**32) == r"a_{12}^{32}{\left( \right)}" + assert latex(Function('a_1')()**32) == r"a_{1}^{32}{\left( \right)}" + assert latex(Function('a_12')()**32) == r"a_{12}^{32}{\left( \right)}" + assert latex(Function('a')(Symbol('x'))**32) == r"a^{32}{\left(x \right)}" + assert latex(Function('a1')(Symbol('x'))**32) == r"a_{1}^{32}{\left(x \right)}" + assert latex(Function('a12')(Symbol('x'))**32) == r"a_{12}^{32}{\left(x \right)}" + assert latex(Function('a_1')(Symbol('x'))**32) == r"a_{1}^{32}{\left(x \right)}" + assert latex(Function('a_12')(Symbol('x'))**32) == r"a_{12}^{32}{\left(x \right)}" + + assert latex(Function('a')()**a) == r"a^{a}{\left( \right)}" + assert latex(Function('a1')()**a) == r"a_{1}^{a}{\left( \right)}" + assert latex(Function('a12')()**a) == r"a_{12}^{a}{\left( \right)}" + assert latex(Function('a_1')()**a) == r"a_{1}^{a}{\left( \right)}" + assert latex(Function('a_12')()**a) == r"a_{12}^{a}{\left( \right)}" + assert latex(Function('a')(Symbol('x'))**a) == r"a^{a}{\left(x \right)}" + assert latex(Function('a1')(Symbol('x'))**a) == r"a_{1}^{a}{\left(x \right)}" + assert latex(Function('a12')(Symbol('x'))**a) == r"a_{12}^{a}{\left(x \right)}" + assert latex(Function('a_1')(Symbol('x'))**a) == r"a_{1}^{a}{\left(x \right)}" + assert latex(Function('a_12')(Symbol('x'))**a) == r"a_{12}^{a}{\left(x \right)}" + + ab = Symbol('ab') + assert latex(Function('a')()**ab) == r"a^{ab}{\left( \right)}" + assert latex(Function('a1')()**ab) == r"a_{1}^{ab}{\left( \right)}" + assert latex(Function('a12')()**ab) == r"a_{12}^{ab}{\left( \right)}" + assert latex(Function('a_1')()**ab) == r"a_{1}^{ab}{\left( \right)}" + assert latex(Function('a_12')()**ab) == r"a_{12}^{ab}{\left( \right)}" + assert latex(Function('a')(Symbol('x'))**ab) == r"a^{ab}{\left(x \right)}" + assert latex(Function('a1')(Symbol('x'))**ab) == r"a_{1}^{ab}{\left(x \right)}" + assert latex(Function('a12')(Symbol('x'))**ab) == r"a_{12}^{ab}{\left(x \right)}" + assert latex(Function('a_1')(Symbol('x'))**ab) == r"a_{1}^{ab}{\left(x \right)}" + assert latex(Function('a_12')(Symbol('x'))**ab) == r"a_{12}^{ab}{\left(x \right)}" + + assert latex(Function('a^12')(x)) == R"a^{12}{\left(x \right)}" + assert latex(Function('a^12')(x) ** ab) == R"\left(a^{12}\right)^{ab}{\left(x \right)}" + assert latex(Function('a__12')(x)) == R"a^{12}{\left(x \right)}" + assert latex(Function('a__12')(x) ** ab) == R"\left(a^{12}\right)^{ab}{\left(x \right)}" + assert latex(Function('a_1__1_2')(x)) == R"a^{1}_{1 2}{\left(x \right)}" + + # issue 5868 + omega1 = Function('omega1') + assert latex(omega1) == r"\omega_{1}" + assert latex(omega1(x)) == r"\omega_{1}{\left(x \right)}" + + assert latex(sin(x)) == r"\sin{\left(x \right)}" + assert latex(sin(x), fold_func_brackets=True) == r"\sin {x}" + assert latex(sin(2*x**2), fold_func_brackets=True) == \ + r"\sin {2 x^{2}}" + assert latex(sin(x**2), fold_func_brackets=True) == \ + r"\sin {x^{2}}" + + assert latex(asin(x)**2) == r"\operatorname{asin}^{2}{\left(x \right)}" + assert latex(asin(x)**2, inv_trig_style="full") == \ + r"\arcsin^{2}{\left(x \right)}" + assert latex(asin(x)**2, inv_trig_style="power") == \ + r"\sin^{-1}{\left(x \right)}^{2}" + assert latex(asin(x**2), inv_trig_style="power", + fold_func_brackets=True) == \ + r"\sin^{-1} {x^{2}}" + assert latex(acsc(x), inv_trig_style="full") == \ + r"\operatorname{arccsc}{\left(x \right)}" + assert latex(asinh(x), inv_trig_style="full") == \ + r"\operatorname{arsinh}{\left(x \right)}" + + assert latex(factorial(k)) == r"k!" + assert latex(factorial(-k)) == r"\left(- k\right)!" + assert latex(factorial(k)**2) == r"k!^{2}" + + assert latex(subfactorial(k)) == r"!k" + assert latex(subfactorial(-k)) == r"!\left(- k\right)" + assert latex(subfactorial(k)**2) == r"\left(!k\right)^{2}" + + assert latex(factorial2(k)) == r"k!!" + assert latex(factorial2(-k)) == r"\left(- k\right)!!" + assert latex(factorial2(k)**2) == r"k!!^{2}" + + assert latex(binomial(2, k)) == r"{\binom{2}{k}}" + assert latex(binomial(2, k)**2) == r"{\binom{2}{k}}^{2}" + + assert latex(FallingFactorial(3, k)) == r"{\left(3\right)}_{k}" + assert latex(RisingFactorial(3, k)) == r"{3}^{\left(k\right)}" + + assert latex(floor(x)) == r"\left\lfloor{x}\right\rfloor" + assert latex(ceiling(x)) == r"\left\lceil{x}\right\rceil" + assert latex(frac(x)) == r"\operatorname{frac}{\left(x\right)}" + assert latex(floor(x)**2) == r"\left\lfloor{x}\right\rfloor^{2}" + assert latex(ceiling(x)**2) == r"\left\lceil{x}\right\rceil^{2}" + assert latex(frac(x)**2) == r"\operatorname{frac}{\left(x\right)}^{2}" + + assert latex(Min(x, 2, x**3)) == r"\min\left(2, x, x^{3}\right)" + assert latex(Min(x, y)**2) == r"\min\left(x, y\right)^{2}" + assert latex(Max(x, 2, x**3)) == r"\max\left(2, x, x^{3}\right)" + assert latex(Max(x, y)**2) == r"\max\left(x, y\right)^{2}" + assert latex(Abs(x)) == r"\left|{x}\right|" + assert latex(Abs(x)**2) == r"\left|{x}\right|^{2}" + assert latex(re(x)) == r"\operatorname{re}{\left(x\right)}" + assert latex(re(x + y)) == \ + r"\operatorname{re}{\left(x\right)} + \operatorname{re}{\left(y\right)}" + assert latex(im(x)) == r"\operatorname{im}{\left(x\right)}" + assert latex(conjugate(x)) == r"\overline{x}" + assert latex(conjugate(x)**2) == r"\overline{x}^{2}" + assert latex(conjugate(x**2)) == r"\overline{x}^{2}" + assert latex(gamma(x)) == r"\Gamma\left(x\right)" + w = Wild('w') + assert latex(gamma(w)) == r"\Gamma\left(w\right)" + assert latex(Order(x)) == r"O\left(x\right)" + assert latex(Order(x, x)) == r"O\left(x\right)" + assert latex(Order(x, (x, 0))) == r"O\left(x\right)" + assert latex(Order(x, (x, oo))) == r"O\left(x; x\rightarrow \infty\right)" + assert latex(Order(x - y, (x, y))) == \ + r"O\left(x - y; x\rightarrow y\right)" + assert latex(Order(x, x, y)) == \ + r"O\left(x; \left( x, \ y\right)\rightarrow \left( 0, \ 0\right)\right)" + assert latex(Order(x, x, y)) == \ + r"O\left(x; \left( x, \ y\right)\rightarrow \left( 0, \ 0\right)\right)" + assert latex(Order(x, (x, oo), (y, oo))) == \ + r"O\left(x; \left( x, \ y\right)\rightarrow \left( \infty, \ \infty\right)\right)" + assert latex(lowergamma(x, y)) == r'\gamma\left(x, y\right)' + assert latex(lowergamma(x, y)**2) == r'\gamma^{2}\left(x, y\right)' + assert latex(uppergamma(x, y)) == r'\Gamma\left(x, y\right)' + assert latex(uppergamma(x, y)**2) == r'\Gamma^{2}\left(x, y\right)' + + assert latex(cot(x)) == r'\cot{\left(x \right)}' + assert latex(coth(x)) == r'\coth{\left(x \right)}' + assert latex(re(x)) == r'\operatorname{re}{\left(x\right)}' + assert latex(im(x)) == r'\operatorname{im}{\left(x\right)}' + assert latex(root(x, y)) == r'x^{\frac{1}{y}}' + assert latex(arg(x)) == r'\arg{\left(x \right)}' + + assert latex(zeta(x)) == r"\zeta\left(x\right)" + assert latex(zeta(x)**2) == r"\zeta^{2}\left(x\right)" + assert latex(zeta(x, y)) == r"\zeta\left(x, y\right)" + assert latex(zeta(x, y)**2) == r"\zeta^{2}\left(x, y\right)" + assert latex(dirichlet_eta(x)) == r"\eta\left(x\right)" + assert latex(dirichlet_eta(x)**2) == r"\eta^{2}\left(x\right)" + assert latex(polylog(x, y)) == r"\operatorname{Li}_{x}\left(y\right)" + assert latex( + polylog(x, y)**2) == r"\operatorname{Li}_{x}^{2}\left(y\right)" + assert latex(lerchphi(x, y, n)) == r"\Phi\left(x, y, n\right)" + assert latex(lerchphi(x, y, n)**2) == r"\Phi^{2}\left(x, y, n\right)" + assert latex(stieltjes(x)) == r"\gamma_{x}" + assert latex(stieltjes(x)**2) == r"\gamma_{x}^{2}" + assert latex(stieltjes(x, y)) == r"\gamma_{x}\left(y\right)" + assert latex(stieltjes(x, y)**2) == r"\gamma_{x}\left(y\right)^{2}" + + assert latex(elliptic_k(z)) == r"K\left(z\right)" + assert latex(elliptic_k(z)**2) == r"K^{2}\left(z\right)" + assert latex(elliptic_f(x, y)) == r"F\left(x\middle| y\right)" + assert latex(elliptic_f(x, y)**2) == r"F^{2}\left(x\middle| y\right)" + assert latex(elliptic_e(x, y)) == r"E\left(x\middle| y\right)" + assert latex(elliptic_e(x, y)**2) == r"E^{2}\left(x\middle| y\right)" + assert latex(elliptic_e(z)) == r"E\left(z\right)" + assert latex(elliptic_e(z)**2) == r"E^{2}\left(z\right)" + assert latex(elliptic_pi(x, y, z)) == r"\Pi\left(x; y\middle| z\right)" + assert latex(elliptic_pi(x, y, z)**2) == \ + r"\Pi^{2}\left(x; y\middle| z\right)" + assert latex(elliptic_pi(x, y)) == r"\Pi\left(x\middle| y\right)" + assert latex(elliptic_pi(x, y)**2) == r"\Pi^{2}\left(x\middle| y\right)" + + assert latex(Ei(x)) == r'\operatorname{Ei}{\left(x \right)}' + assert latex(Ei(x)**2) == r'\operatorname{Ei}^{2}{\left(x \right)}' + assert latex(expint(x, y)) == r'\operatorname{E}_{x}\left(y\right)' + assert latex(expint(x, y)**2) == r'\operatorname{E}_{x}^{2}\left(y\right)' + assert latex(Shi(x)**2) == r'\operatorname{Shi}^{2}{\left(x \right)}' + assert latex(Si(x)**2) == r'\operatorname{Si}^{2}{\left(x \right)}' + assert latex(Ci(x)**2) == r'\operatorname{Ci}^{2}{\left(x \right)}' + assert latex(Chi(x)**2) == r'\operatorname{Chi}^{2}\left(x\right)' + assert latex(Chi(x)) == r'\operatorname{Chi}\left(x\right)' + assert latex(jacobi(n, a, b, x)) == \ + r'P_{n}^{\left(a,b\right)}\left(x\right)' + assert latex(jacobi(n, a, b, x)**2) == \ + r'\left(P_{n}^{\left(a,b\right)}\left(x\right)\right)^{2}' + assert latex(gegenbauer(n, a, x)) == \ + r'C_{n}^{\left(a\right)}\left(x\right)' + assert latex(gegenbauer(n, a, x)**2) == \ + r'\left(C_{n}^{\left(a\right)}\left(x\right)\right)^{2}' + assert latex(chebyshevt(n, x)) == r'T_{n}\left(x\right)' + assert latex(chebyshevt(n, x)**2) == \ + r'\left(T_{n}\left(x\right)\right)^{2}' + assert latex(chebyshevu(n, x)) == r'U_{n}\left(x\right)' + assert latex(chebyshevu(n, x)**2) == \ + r'\left(U_{n}\left(x\right)\right)^{2}' + assert latex(legendre(n, x)) == r'P_{n}\left(x\right)' + assert latex(legendre(n, x)**2) == r'\left(P_{n}\left(x\right)\right)^{2}' + assert latex(assoc_legendre(n, a, x)) == \ + r'P_{n}^{\left(a\right)}\left(x\right)' + assert latex(assoc_legendre(n, a, x)**2) == \ + r'\left(P_{n}^{\left(a\right)}\left(x\right)\right)^{2}' + assert latex(laguerre(n, x)) == r'L_{n}\left(x\right)' + assert latex(laguerre(n, x)**2) == r'\left(L_{n}\left(x\right)\right)^{2}' + assert latex(assoc_laguerre(n, a, x)) == \ + r'L_{n}^{\left(a\right)}\left(x\right)' + assert latex(assoc_laguerre(n, a, x)**2) == \ + r'\left(L_{n}^{\left(a\right)}\left(x\right)\right)^{2}' + assert latex(hermite(n, x)) == r'H_{n}\left(x\right)' + assert latex(hermite(n, x)**2) == r'\left(H_{n}\left(x\right)\right)^{2}' + + theta = Symbol("theta", real=True) + phi = Symbol("phi", real=True) + assert latex(Ynm(n, m, theta, phi)) == r'Y_{n}^{m}\left(\theta,\phi\right)' + assert latex(Ynm(n, m, theta, phi)**3) == \ + r'\left(Y_{n}^{m}\left(\theta,\phi\right)\right)^{3}' + assert latex(Znm(n, m, theta, phi)) == r'Z_{n}^{m}\left(\theta,\phi\right)' + assert latex(Znm(n, m, theta, phi)**3) == \ + r'\left(Z_{n}^{m}\left(\theta,\phi\right)\right)^{3}' + + # Test latex printing of function names with "_" + assert latex(polar_lift(0)) == \ + r"\operatorname{polar\_lift}{\left(0 \right)}" + assert latex(polar_lift(0)**3) == \ + r"\operatorname{polar\_lift}^{3}{\left(0 \right)}" + + assert latex(totient(n)) == r'\phi\left(n\right)' + assert latex(totient(n) ** 2) == r'\left(\phi\left(n\right)\right)^{2}' + + assert latex(reduced_totient(n)) == r'\lambda\left(n\right)' + assert latex(reduced_totient(n) ** 2) == \ + r'\left(\lambda\left(n\right)\right)^{2}' + + assert latex(divisor_sigma(x)) == r"\sigma\left(x\right)" + assert latex(divisor_sigma(x)**2) == r"\sigma^{2}\left(x\right)" + assert latex(divisor_sigma(x, y)) == r"\sigma_y\left(x\right)" + assert latex(divisor_sigma(x, y)**2) == r"\sigma^{2}_y\left(x\right)" + + assert latex(udivisor_sigma(x)) == r"\sigma^*\left(x\right)" + assert latex(udivisor_sigma(x)**2) == r"\sigma^*^{2}\left(x\right)" + assert latex(udivisor_sigma(x, y)) == r"\sigma^*_y\left(x\right)" + assert latex(udivisor_sigma(x, y)**2) == r"\sigma^*^{2}_y\left(x\right)" + + assert latex(primenu(n)) == r'\nu\left(n\right)' + assert latex(primenu(n) ** 2) == r'\left(\nu\left(n\right)\right)^{2}' + + assert latex(primeomega(n)) == r'\Omega\left(n\right)' + assert latex(primeomega(n) ** 2) == \ + r'\left(\Omega\left(n\right)\right)^{2}' + + assert latex(LambertW(n)) == r'W\left(n\right)' + assert latex(LambertW(n, -1)) == r'W_{-1}\left(n\right)' + assert latex(LambertW(n, k)) == r'W_{k}\left(n\right)' + assert latex(LambertW(n) * LambertW(n)) == r"W^{2}\left(n\right)" + assert latex(Pow(LambertW(n), 2)) == r"W^{2}\left(n\right)" + assert latex(LambertW(n)**k) == r"W^{k}\left(n\right)" + assert latex(LambertW(n, k)**p) == r"W^{p}_{k}\left(n\right)" + + assert latex(Mod(x, 7)) == r'x \bmod 7' + assert latex(Mod(x + 1, 7)) == r'\left(x + 1\right) \bmod 7' + assert latex(Mod(7, x + 1)) == r'7 \bmod \left(x + 1\right)' + assert latex(Mod(2 * x, 7)) == r'2 x \bmod 7' + assert latex(Mod(7, 2 * x)) == r'7 \bmod 2 x' + assert latex(Mod(x, 7) + 1) == r'\left(x \bmod 7\right) + 1' + assert latex(2 * Mod(x, 7)) == r'2 \left(x \bmod 7\right)' + assert latex(Mod(7, 2 * x)**n) == r'\left(7 \bmod 2 x\right)^{n}' + + # some unknown function name should get rendered with \operatorname + fjlkd = Function('fjlkd') + assert latex(fjlkd(x)) == r'\operatorname{fjlkd}{\left(x \right)}' + # even when it is referred to without an argument + assert latex(fjlkd) == r'\operatorname{fjlkd}' + + +# test that notation passes to subclasses of the same name only +def test_function_subclass_different_name(): + class mygamma(gamma): + pass + assert latex(mygamma) == r"\operatorname{mygamma}" + assert latex(mygamma(x)) == r"\operatorname{mygamma}{\left(x \right)}" + + +def test_hyper_printing(): + from sympy.abc import x, z + + assert latex(meijerg(Tuple(pi, pi, x), Tuple(1), + (0, 1), Tuple(1, 2, 3/pi), z)) == \ + r'{G_{4, 5}^{2, 3}\left(\begin{matrix} \pi, \pi, x & 1 \\0, 1 & 1, 2, '\ + r'\frac{3}{\pi} \end{matrix} \middle| {z} \right)}' + assert latex(meijerg(Tuple(), Tuple(1), (0,), Tuple(), z)) == \ + r'{G_{1, 1}^{1, 0}\left(\begin{matrix} & 1 \\0 & \end{matrix} \middle| {z} \right)}' + assert latex(hyper((x, 2), (3,), z)) == \ + r'{{}_{2}F_{1}\left(\begin{matrix} 2, x ' \ + r'\\ 3 \end{matrix}\middle| {z} \right)}' + assert latex(hyper(Tuple(), Tuple(1), z)) == \ + r'{{}_{0}F_{1}\left(\begin{matrix} ' \ + r'\\ 1 \end{matrix}\middle| {z} \right)}' + + +def test_latex_bessel(): + from sympy.functions.special.bessel import (besselj, bessely, besseli, + besselk, hankel1, hankel2, + jn, yn, hn1, hn2) + from sympy.abc import z + assert latex(besselj(n, z**2)**k) == r'J^{k}_{n}\left(z^{2}\right)' + assert latex(bessely(n, z)) == r'Y_{n}\left(z\right)' + assert latex(besseli(n, z)) == r'I_{n}\left(z\right)' + assert latex(besselk(n, z)) == r'K_{n}\left(z\right)' + assert latex(hankel1(n, z**2)**2) == \ + r'\left(H^{(1)}_{n}\left(z^{2}\right)\right)^{2}' + assert latex(hankel2(n, z)) == r'H^{(2)}_{n}\left(z\right)' + assert latex(jn(n, z)) == r'j_{n}\left(z\right)' + assert latex(yn(n, z)) == r'y_{n}\left(z\right)' + assert latex(hn1(n, z)) == r'h^{(1)}_{n}\left(z\right)' + assert latex(hn2(n, z)) == r'h^{(2)}_{n}\left(z\right)' + + +def test_latex_fresnel(): + from sympy.functions.special.error_functions import (fresnels, fresnelc) + from sympy.abc import z + assert latex(fresnels(z)) == r'S\left(z\right)' + assert latex(fresnelc(z)) == r'C\left(z\right)' + assert latex(fresnels(z)**2) == r'S^{2}\left(z\right)' + assert latex(fresnelc(z)**2) == r'C^{2}\left(z\right)' + + +def test_latex_brackets(): + assert latex((-1)**x) == r"\left(-1\right)^{x}" + + +def test_latex_indexed(): + Psi_symbol = Symbol('Psi_0', complex=True, real=False) + Psi_indexed = IndexedBase(Symbol('Psi', complex=True, real=False)) + symbol_latex = latex(Psi_symbol * conjugate(Psi_symbol)) + indexed_latex = latex(Psi_indexed[0] * conjugate(Psi_indexed[0])) + # \\overline{{\\Psi}_{0}} {\\Psi}_{0} vs. \\Psi_{0} \\overline{\\Psi_{0}} + assert symbol_latex == r'\Psi_{0} \overline{\Psi_{0}}' + assert indexed_latex == r'\overline{{\Psi}_{0}} {\Psi}_{0}' + + # Symbol('gamma') gives r'\gamma' + interval = '\\mathrel{..}\\nobreak ' + assert latex(Indexed('x1', Symbol('i'))) == r'{x_{1}}_{i}' + assert latex(Indexed('x2', Idx('i'))) == r'{x_{2}}_{i}' + assert latex(Indexed('x3', Idx('i', Symbol('N')))) == r'{x_{3}}_{{i}_{0'+interval+'N - 1}}' + assert latex(Indexed('x3', Idx('i', Symbol('N')+1))) == r'{x_{3}}_{{i}_{0'+interval+'N}}' + assert latex(Indexed('x4', Idx('i', (Symbol('a'),Symbol('b'))))) == r'{x_{4}}_{{i}_{a'+interval+'b}}' + assert latex(IndexedBase('gamma')) == r'\gamma' + assert latex(IndexedBase('a b')) == r'a b' + assert latex(IndexedBase('a_b')) == r'a_{b}' + + +def test_latex_derivatives(): + # regular "d" for ordinary derivatives + assert latex(diff(x**3, x, evaluate=False)) == \ + r"\frac{d}{d x} x^{3}" + assert latex(diff(sin(x) + x**2, x, evaluate=False)) == \ + r"\frac{d}{d x} \left(x^{2} + \sin{\left(x \right)}\right)" + assert latex(diff(diff(sin(x) + x**2, x, evaluate=False), evaluate=False))\ + == \ + r"\frac{d^{2}}{d x^{2}} \left(x^{2} + \sin{\left(x \right)}\right)" + assert latex(diff(diff(diff(sin(x) + x**2, x, evaluate=False), evaluate=False), evaluate=False)) == \ + r"\frac{d^{3}}{d x^{3}} \left(x^{2} + \sin{\left(x \right)}\right)" + + # \partial for partial derivatives + assert latex(diff(sin(x * y), x, evaluate=False)) == \ + r"\frac{\partial}{\partial x} \sin{\left(x y \right)}" + assert latex(diff(sin(x * y) + x**2, x, evaluate=False)) == \ + r"\frac{\partial}{\partial x} \left(x^{2} + \sin{\left(x y \right)}\right)" + assert latex(diff(diff(sin(x*y) + x**2, x, evaluate=False), x, evaluate=False)) == \ + r"\frac{\partial^{2}}{\partial x^{2}} \left(x^{2} + \sin{\left(x y \right)}\right)" + assert latex(diff(diff(diff(sin(x*y) + x**2, x, evaluate=False), x, evaluate=False), x, evaluate=False)) == \ + r"\frac{\partial^{3}}{\partial x^{3}} \left(x^{2} + \sin{\left(x y \right)}\right)" + + # mixed partial derivatives + f = Function("f") + assert latex(diff(diff(f(x, y), x, evaluate=False), y, evaluate=False)) == \ + r"\frac{\partial^{2}}{\partial y\partial x} " + latex(f(x, y)) + + assert latex(diff(diff(diff(f(x, y), x, evaluate=False), x, evaluate=False), y, evaluate=False)) == \ + r"\frac{\partial^{3}}{\partial y\partial x^{2}} " + latex(f(x, y)) + + # for negative nested Derivative + assert latex(diff(-diff(y**2,x,evaluate=False),x,evaluate=False)) == r'\frac{d}{d x} \left(- \frac{d}{d x} y^{2}\right)' + assert latex(diff(diff(-diff(diff(y,x,evaluate=False),x,evaluate=False),x,evaluate=False),x,evaluate=False)) == \ + r'\frac{d^{2}}{d x^{2}} \left(- \frac{d^{2}}{d x^{2}} y\right)' + + # use ordinary d when one of the variables has been integrated out + assert latex(diff(Integral(exp(-x*y), (x, 0, oo)), y, evaluate=False)) == \ + r"\frac{d}{d y} \int\limits_{0}^{\infty} e^{- x y}\, dx" + + # Derivative wrapped in power: + assert latex(diff(x, x, evaluate=False)**2) == \ + r"\left(\frac{d}{d x} x\right)^{2}" + + assert latex(diff(f(x), x)**2) == \ + r"\left(\frac{d}{d x} f{\left(x \right)}\right)^{2}" + + assert latex(diff(f(x), (x, n))) == \ + r"\frac{d^{n}}{d x^{n}} f{\left(x \right)}" + + x1 = Symbol('x1') + x2 = Symbol('x2') + assert latex(diff(f(x1, x2), x1)) == r'\frac{\partial}{\partial x_{1}} f{\left(x_{1},x_{2} \right)}' + + n1 = Symbol('n1') + assert latex(diff(f(x), (x, n1))) == r'\frac{d^{n_{1}}}{d x^{n_{1}}} f{\left(x \right)}' + + n2 = Symbol('n2') + assert latex(diff(f(x), (x, Max(n1, n2)))) == \ + r'\frac{d^{\max\left(n_{1}, n_{2}\right)}}{d x^{\max\left(n_{1}, n_{2}\right)}} f{\left(x \right)}' + + # set diff operator + assert latex(diff(f(x), x), diff_operator="rd") == r'\frac{\mathrm{d}}{\mathrm{d} x} f{\left(x \right)}' + + +def test_latex_subs(): + assert latex(Subs(x*y, (x, y), (1, 2))) == r'\left. x y \right|_{\substack{ x=1\\ y=2 }}' + + +def test_latex_integrals(): + assert latex(Integral(log(x), x)) == r"\int \log{\left(x \right)}\, dx" + assert latex(Integral(x**2, (x, 0, 1))) == \ + r"\int\limits_{0}^{1} x^{2}\, dx" + assert latex(Integral(x**2, (x, 10, 20))) == \ + r"\int\limits_{10}^{20} x^{2}\, dx" + assert latex(Integral(y*x**2, (x, 0, 1), y)) == \ + r"\int\int\limits_{0}^{1} x^{2} y\, dx\, dy" + assert latex(Integral(y*x**2, (x, 0, 1), y), mode='equation*') == \ + r"\begin{equation*}\int\int\limits_{0}^{1} x^{2} y\, dx\, dy\end{equation*}" + assert latex(Integral(y*x**2, (x, 0, 1), y), mode='equation*', itex=True) \ + == r"$$\int\int_{0}^{1} x^{2} y\, dx\, dy$$" + assert latex(Integral(x, (x, 0))) == r"\int\limits^{0} x\, dx" + assert latex(Integral(x*y, x, y)) == r"\iint x y\, dx\, dy" + assert latex(Integral(x*y*z, x, y, z)) == r"\iiint x y z\, dx\, dy\, dz" + assert latex(Integral(x*y*z*t, x, y, z, t)) == \ + r"\iiiint t x y z\, dx\, dy\, dz\, dt" + assert latex(Integral(x, x, x, x, x, x, x)) == \ + r"\int\int\int\int\int\int x\, dx\, dx\, dx\, dx\, dx\, dx" + assert latex(Integral(x, x, y, (z, 0, 1))) == \ + r"\int\limits_{0}^{1}\int\int x\, dx\, dy\, dz" + + # for negative nested Integral + assert latex(Integral(-Integral(y**2,x),x)) == \ + r'\int \left(- \int y^{2}\, dx\right)\, dx' + assert latex(Integral(-Integral(-Integral(y,x),x),x)) == \ + r'\int \left(- \int \left(- \int y\, dx\right)\, dx\right)\, dx' + + # fix issue #10806 + assert latex(Integral(z, z)**2) == r"\left(\int z\, dz\right)^{2}" + assert latex(Integral(x + z, z)) == r"\int \left(x + z\right)\, dz" + assert latex(Integral(x+z/2, z)) == \ + r"\int \left(x + \frac{z}{2}\right)\, dz" + assert latex(Integral(x**y, z)) == r"\int x^{y}\, dz" + + # set diff operator + assert latex(Integral(x, x), diff_operator="rd") == r'\int x\, \mathrm{d}x' + assert latex(Integral(x, (x, 0, 1)), diff_operator="rd") == r'\int\limits_{0}^{1} x\, \mathrm{d}x' + + +def test_latex_sets(): + for s in (frozenset, set): + assert latex(s([x*y, x**2])) == r"\left\{x^{2}, x y\right\}" + assert latex(s(range(1, 6))) == r"\left\{1, 2, 3, 4, 5\right\}" + assert latex(s(range(1, 13))) == \ + r"\left\{1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12\right\}" + + s = FiniteSet + assert latex(s(*[x*y, x**2])) == r"\left\{x^{2}, x y\right\}" + assert latex(s(*range(1, 6))) == r"\left\{1, 2, 3, 4, 5\right\}" + assert latex(s(*range(1, 13))) == \ + r"\left\{1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12\right\}" + + +def test_latex_SetExpr(): + iv = Interval(1, 3) + se = SetExpr(iv) + assert latex(se) == r"SetExpr\left(\left[1, 3\right]\right)" + + +def test_latex_Range(): + assert latex(Range(1, 51)) == r'\left\{1, 2, \ldots, 50\right\}' + assert latex(Range(1, 4)) == r'\left\{1, 2, 3\right\}' + assert latex(Range(0, 3, 1)) == r'\left\{0, 1, 2\right\}' + assert latex(Range(0, 30, 1)) == r'\left\{0, 1, \ldots, 29\right\}' + assert latex(Range(30, 1, -1)) == r'\left\{30, 29, \ldots, 2\right\}' + assert latex(Range(0, oo, 2)) == r'\left\{0, 2, \ldots\right\}' + assert latex(Range(oo, -2, -2)) == r'\left\{\ldots, 2, 0\right\}' + assert latex(Range(-2, -oo, -1)) == r'\left\{-2, -3, \ldots\right\}' + assert latex(Range(-oo, oo)) == r'\left\{\ldots, -1, 0, 1, \ldots\right\}' + assert latex(Range(oo, -oo, -1)) == r'\left\{\ldots, 1, 0, -1, \ldots\right\}' + + a, b, c = symbols('a:c') + assert latex(Range(a, b, c)) == r'\text{Range}\left(a, b, c\right)' + assert latex(Range(a, 10, 1)) == r'\text{Range}\left(a, 10\right)' + assert latex(Range(0, b, 1)) == r'\text{Range}\left(b\right)' + assert latex(Range(0, 10, c)) == r'\text{Range}\left(0, 10, c\right)' + + i = Symbol('i', integer=True) + n = Symbol('n', negative=True, integer=True) + p = Symbol('p', positive=True, integer=True) + + assert latex(Range(i, i + 3)) == r'\left\{i, i + 1, i + 2\right\}' + assert latex(Range(-oo, n, 2)) == r'\left\{\ldots, n - 4, n - 2\right\}' + assert latex(Range(p, oo)) == r'\left\{p, p + 1, \ldots\right\}' + # The following will work if __iter__ is improved + # assert latex(Range(-3, p + 7)) == r'\left\{-3, -2, \ldots, p + 6\right\}' + # Must have integer assumptions + assert latex(Range(a, a + 3)) == r'\text{Range}\left(a, a + 3\right)' + + +def test_latex_sequences(): + s1 = SeqFormula(a**2, (0, oo)) + s2 = SeqPer((1, 2)) + + latex_str = r'\left[0, 1, 4, 9, \ldots\right]' + assert latex(s1) == latex_str + + latex_str = r'\left[1, 2, 1, 2, \ldots\right]' + assert latex(s2) == latex_str + + s3 = SeqFormula(a**2, (0, 2)) + s4 = SeqPer((1, 2), (0, 2)) + + latex_str = r'\left[0, 1, 4\right]' + assert latex(s3) == latex_str + + latex_str = r'\left[1, 2, 1\right]' + assert latex(s4) == latex_str + + s5 = SeqFormula(a**2, (-oo, 0)) + s6 = SeqPer((1, 2), (-oo, 0)) + + latex_str = r'\left[\ldots, 9, 4, 1, 0\right]' + assert latex(s5) == latex_str + + latex_str = r'\left[\ldots, 2, 1, 2, 1\right]' + assert latex(s6) == latex_str + + latex_str = r'\left[1, 3, 5, 11, \ldots\right]' + assert latex(SeqAdd(s1, s2)) == latex_str + + latex_str = r'\left[1, 3, 5\right]' + assert latex(SeqAdd(s3, s4)) == latex_str + + latex_str = r'\left[\ldots, 11, 5, 3, 1\right]' + assert latex(SeqAdd(s5, s6)) == latex_str + + latex_str = r'\left[0, 2, 4, 18, \ldots\right]' + assert latex(SeqMul(s1, s2)) == latex_str + + latex_str = r'\left[0, 2, 4\right]' + assert latex(SeqMul(s3, s4)) == latex_str + + latex_str = r'\left[\ldots, 18, 4, 2, 0\right]' + assert latex(SeqMul(s5, s6)) == latex_str + + # Sequences with symbolic limits, issue 12629 + s7 = SeqFormula(a**2, (a, 0, x)) + latex_str = r'\left\{a^{2}\right\}_{a=0}^{x}' + assert latex(s7) == latex_str + + b = Symbol('b') + s8 = SeqFormula(b*a**2, (a, 0, 2)) + latex_str = r'\left[0, b, 4 b\right]' + assert latex(s8) == latex_str + + +def test_latex_FourierSeries(): + latex_str = \ + r'2 \sin{\left(x \right)} - \sin{\left(2 x \right)} + \frac{2 \sin{\left(3 x \right)}}{3} + \ldots' + assert latex(fourier_series(x, (x, -pi, pi))) == latex_str + + +def test_latex_FormalPowerSeries(): + latex_str = r'\sum_{k=1}^{\infty} - \frac{\left(-1\right)^{- k} x^{k}}{k}' + assert latex(fps(log(1 + x))) == latex_str + + +def test_latex_intervals(): + a = Symbol('a', real=True) + assert latex(Interval(0, 0)) == r"\left\{0\right\}" + assert latex(Interval(0, a)) == r"\left[0, a\right]" + assert latex(Interval(0, a, False, False)) == r"\left[0, a\right]" + assert latex(Interval(0, a, True, False)) == r"\left(0, a\right]" + assert latex(Interval(0, a, False, True)) == r"\left[0, a\right)" + assert latex(Interval(0, a, True, True)) == r"\left(0, a\right)" + + +def test_latex_AccumuBounds(): + a = Symbol('a', real=True) + assert latex(AccumBounds(0, 1)) == r"\left\langle 0, 1\right\rangle" + assert latex(AccumBounds(0, a)) == r"\left\langle 0, a\right\rangle" + assert latex(AccumBounds(a + 1, a + 2)) == \ + r"\left\langle a + 1, a + 2\right\rangle" + + +def test_latex_emptyset(): + assert latex(S.EmptySet) == r"\emptyset" + + +def test_latex_universalset(): + assert latex(S.UniversalSet) == r"\mathbb{U}" + + +def test_latex_commutator(): + A = Operator('A') + B = Operator('B') + comm = Commutator(B, A) + assert latex(comm.doit()) == r"- (A B - B A)" + + +def test_latex_union(): + assert latex(Union(Interval(0, 1), Interval(2, 3))) == \ + r"\left[0, 1\right] \cup \left[2, 3\right]" + assert latex(Union(Interval(1, 1), Interval(2, 2), Interval(3, 4))) == \ + r"\left\{1, 2\right\} \cup \left[3, 4\right]" + + +def test_latex_intersection(): + assert latex(Intersection(Interval(0, 1), Interval(x, y))) == \ + r"\left[0, 1\right] \cap \left[x, y\right]" + + +def test_latex_symmetric_difference(): + assert latex(SymmetricDifference(Interval(2, 5), Interval(4, 7), + evaluate=False)) == \ + r'\left[2, 5\right] \triangle \left[4, 7\right]' + + +def test_latex_Complement(): + assert latex(Complement(S.Reals, S.Naturals)) == \ + r"\mathbb{R} \setminus \mathbb{N}" + + +def test_latex_productset(): + line = Interval(0, 1) + bigline = Interval(0, 10) + fset = FiniteSet(1, 2, 3) + assert latex(line**2) == r"%s^{2}" % latex(line) + assert latex(line**10) == r"%s^{10}" % latex(line) + assert latex((line * bigline * fset).flatten()) == r"%s \times %s \times %s" % ( + latex(line), latex(bigline), latex(fset)) + + +def test_latex_powerset(): + fset = FiniteSet(1, 2, 3) + assert latex(PowerSet(fset)) == r'\mathcal{P}\left(\left\{1, 2, 3\right\}\right)' + + +def test_latex_ordinals(): + w = OrdinalOmega() + assert latex(w) == r"\omega" + wp = OmegaPower(2, 3) + assert latex(wp) == r'3 \omega^{2}' + assert latex(Ordinal(wp, OmegaPower(1, 1))) == r'3 \omega^{2} + \omega' + assert latex(Ordinal(OmegaPower(2, 1), OmegaPower(1, 2))) == r'\omega^{2} + 2 \omega' + + +def test_set_operators_parenthesis(): + a, b, c, d = symbols('a:d') + A = FiniteSet(a) + B = FiniteSet(b) + C = FiniteSet(c) + D = FiniteSet(d) + + U1 = Union(A, B, evaluate=False) + U2 = Union(C, D, evaluate=False) + I1 = Intersection(A, B, evaluate=False) + I2 = Intersection(C, D, evaluate=False) + C1 = Complement(A, B, evaluate=False) + C2 = Complement(C, D, evaluate=False) + D1 = SymmetricDifference(A, B, evaluate=False) + D2 = SymmetricDifference(C, D, evaluate=False) + # XXX ProductSet does not support evaluate keyword + P1 = ProductSet(A, B) + P2 = ProductSet(C, D) + + assert latex(Intersection(A, U2, evaluate=False)) == \ + r'\left\{a\right\} \cap ' \ + r'\left(\left\{c\right\} \cup \left\{d\right\}\right)' + assert latex(Intersection(U1, U2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cup \left\{b\right\}\right) ' \ + r'\cap \left(\left\{c\right\} \cup \left\{d\right\}\right)' + assert latex(Intersection(C1, C2, evaluate=False)) == \ + r'\left(\left\{a\right\} \setminus ' \ + r'\left\{b\right\}\right) \cap \left(\left\{c\right\} ' \ + r'\setminus \left\{d\right\}\right)' + assert latex(Intersection(D1, D2, evaluate=False)) == \ + r'\left(\left\{a\right\} \triangle ' \ + r'\left\{b\right\}\right) \cap \left(\left\{c\right\} ' \ + r'\triangle \left\{d\right\}\right)' + assert latex(Intersection(P1, P2, evaluate=False)) == \ + r'\left(\left\{a\right\} \times \left\{b\right\}\right) ' \ + r'\cap \left(\left\{c\right\} \times ' \ + r'\left\{d\right\}\right)' + + assert latex(Union(A, I2, evaluate=False)) == \ + r'\left\{a\right\} \cup ' \ + r'\left(\left\{c\right\} \cap \left\{d\right\}\right)' + assert latex(Union(I1, I2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cap \left\{b\right\}\right) ' \ + r'\cup \left(\left\{c\right\} \cap \left\{d\right\}\right)' + assert latex(Union(C1, C2, evaluate=False)) == \ + r'\left(\left\{a\right\} \setminus ' \ + r'\left\{b\right\}\right) \cup \left(\left\{c\right\} ' \ + r'\setminus \left\{d\right\}\right)' + assert latex(Union(D1, D2, evaluate=False)) == \ + r'\left(\left\{a\right\} \triangle ' \ + r'\left\{b\right\}\right) \cup \left(\left\{c\right\} ' \ + r'\triangle \left\{d\right\}\right)' + assert latex(Union(P1, P2, evaluate=False)) == \ + r'\left(\left\{a\right\} \times \left\{b\right\}\right) ' \ + r'\cup \left(\left\{c\right\} \times ' \ + r'\left\{d\right\}\right)' + + assert latex(Complement(A, C2, evaluate=False)) == \ + r'\left\{a\right\} \setminus \left(\left\{c\right\} ' \ + r'\setminus \left\{d\right\}\right)' + assert latex(Complement(U1, U2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cup \left\{b\right\}\right) ' \ + r'\setminus \left(\left\{c\right\} \cup ' \ + r'\left\{d\right\}\right)' + assert latex(Complement(I1, I2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cap \left\{b\right\}\right) ' \ + r'\setminus \left(\left\{c\right\} \cap ' \ + r'\left\{d\right\}\right)' + assert latex(Complement(D1, D2, evaluate=False)) == \ + r'\left(\left\{a\right\} \triangle ' \ + r'\left\{b\right\}\right) \setminus ' \ + r'\left(\left\{c\right\} \triangle \left\{d\right\}\right)' + assert latex(Complement(P1, P2, evaluate=False)) == \ + r'\left(\left\{a\right\} \times \left\{b\right\}\right) '\ + r'\setminus \left(\left\{c\right\} \times '\ + r'\left\{d\right\}\right)' + + assert latex(SymmetricDifference(A, D2, evaluate=False)) == \ + r'\left\{a\right\} \triangle \left(\left\{c\right\} ' \ + r'\triangle \left\{d\right\}\right)' + assert latex(SymmetricDifference(U1, U2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cup \left\{b\right\}\right) ' \ + r'\triangle \left(\left\{c\right\} \cup ' \ + r'\left\{d\right\}\right)' + assert latex(SymmetricDifference(I1, I2, evaluate=False)) == \ + r'\left(\left\{a\right\} \cap \left\{b\right\}\right) ' \ + r'\triangle \left(\left\{c\right\} \cap ' \ + r'\left\{d\right\}\right)' + assert latex(SymmetricDifference(C1, C2, evaluate=False)) == \ + r'\left(\left\{a\right\} \setminus ' \ + r'\left\{b\right\}\right) \triangle ' \ + r'\left(\left\{c\right\} \setminus \left\{d\right\}\right)' + assert latex(SymmetricDifference(P1, P2, evaluate=False)) == \ + r'\left(\left\{a\right\} \times \left\{b\right\}\right) ' \ + r'\triangle \left(\left\{c\right\} \times ' \ + r'\left\{d\right\}\right)' + + # XXX This can be incorrect since cartesian product is not associative + assert latex(ProductSet(A, P2).flatten()) == \ + r'\left\{a\right\} \times \left\{c\right\} \times ' \ + r'\left\{d\right\}' + assert latex(ProductSet(U1, U2)) == \ + r'\left(\left\{a\right\} \cup \left\{b\right\}\right) ' \ + r'\times \left(\left\{c\right\} \cup ' \ + r'\left\{d\right\}\right)' + assert latex(ProductSet(I1, I2)) == \ + r'\left(\left\{a\right\} \cap \left\{b\right\}\right) ' \ + r'\times \left(\left\{c\right\} \cap ' \ + r'\left\{d\right\}\right)' + assert latex(ProductSet(C1, C2)) == \ + r'\left(\left\{a\right\} \setminus ' \ + r'\left\{b\right\}\right) \times \left(\left\{c\right\} ' \ + r'\setminus \left\{d\right\}\right)' + assert latex(ProductSet(D1, D2)) == \ + r'\left(\left\{a\right\} \triangle ' \ + r'\left\{b\right\}\right) \times \left(\left\{c\right\} ' \ + r'\triangle \left\{d\right\}\right)' + + +def test_latex_Complexes(): + assert latex(S.Complexes) == r"\mathbb{C}" + + +def test_latex_Naturals(): + assert latex(S.Naturals) == r"\mathbb{N}" + + +def test_latex_Naturals0(): + assert latex(S.Naturals0) == r"\mathbb{N}_0" + + +def test_latex_Integers(): + assert latex(S.Integers) == r"\mathbb{Z}" + + +def test_latex_ImageSet(): + x = Symbol('x') + assert latex(ImageSet(Lambda(x, x**2), S.Naturals)) == \ + r"\left\{x^{2}\; \middle|\; x \in \mathbb{N}\right\}" + + y = Symbol('y') + imgset = ImageSet(Lambda((x, y), x + y), {1, 2, 3}, {3, 4}) + assert latex(imgset) == \ + r"\left\{x + y\; \middle|\; x \in \left\{1, 2, 3\right\}, y \in \left\{3, 4\right\}\right\}" + + imgset = ImageSet(Lambda(((x, y),), x + y), ProductSet({1, 2, 3}, {3, 4})) + assert latex(imgset) == \ + r"\left\{x + y\; \middle|\; \left( x, \ y\right) \in \left\{1, 2, 3\right\} \times \left\{3, 4\right\}\right\}" + + +def test_latex_ConditionSet(): + x = Symbol('x') + assert latex(ConditionSet(x, Eq(x**2, 1), S.Reals)) == \ + r"\left\{x\; \middle|\; x \in \mathbb{R} \wedge x^{2} = 1 \right\}" + assert latex(ConditionSet(x, Eq(x**2, 1), S.UniversalSet)) == \ + r"\left\{x\; \middle|\; x^{2} = 1 \right\}" + + +def test_latex_ComplexRegion(): + assert latex(ComplexRegion(Interval(3, 5)*Interval(4, 6))) == \ + r"\left\{x + y i\; \middle|\; x, y \in \left[3, 5\right] \times \left[4, 6\right] \right\}" + assert latex(ComplexRegion(Interval(0, 1)*Interval(0, 2*pi), polar=True)) == \ + r"\left\{r \left(i \sin{\left(\theta \right)} + \cos{\left(\theta "\ + r"\right)}\right)\; \middle|\; r, \theta \in \left[0, 1\right] \times \left[0, 2 \pi\right) \right\}" + + +def test_latex_Contains(): + x = Symbol('x') + assert latex(Contains(x, S.Naturals)) == r"x \in \mathbb{N}" + + +def test_latex_sum(): + assert latex(Sum(x*y**2, (x, -2, 2), (y, -5, 5))) == \ + r"\sum_{\substack{-2 \leq x \leq 2\\-5 \leq y \leq 5}} x y^{2}" + assert latex(Sum(x**2, (x, -2, 2))) == \ + r"\sum_{x=-2}^{2} x^{2}" + assert latex(Sum(x**2 + y, (x, -2, 2))) == \ + r"\sum_{x=-2}^{2} \left(x^{2} + y\right)" + assert latex(Sum(x**2 + y, (x, -2, 2))**2) == \ + r"\left(\sum_{x=-2}^{2} \left(x^{2} + y\right)\right)^{2}" + + +def test_latex_product(): + assert latex(Product(x*y**2, (x, -2, 2), (y, -5, 5))) == \ + r"\prod_{\substack{-2 \leq x \leq 2\\-5 \leq y \leq 5}} x y^{2}" + assert latex(Product(x**2, (x, -2, 2))) == \ + r"\prod_{x=-2}^{2} x^{2}" + assert latex(Product(x**2 + y, (x, -2, 2))) == \ + r"\prod_{x=-2}^{2} \left(x^{2} + y\right)" + + assert latex(Product(x, (x, -2, 2))**2) == \ + r"\left(\prod_{x=-2}^{2} x\right)^{2}" + + +def test_latex_limits(): + assert latex(Limit(x, x, oo)) == r"\lim_{x \to \infty} x" + + # issue 8175 + f = Function('f') + assert latex(Limit(f(x), x, 0)) == r"\lim_{x \to 0^+} f{\left(x \right)}" + assert latex(Limit(f(x), x, 0, "-")) == \ + r"\lim_{x \to 0^-} f{\left(x \right)}" + + # issue #10806 + assert latex(Limit(f(x), x, 0)**2) == \ + r"\left(\lim_{x \to 0^+} f{\left(x \right)}\right)^{2}" + # bi-directional limit + assert latex(Limit(f(x), x, 0, dir='+-')) == \ + r"\lim_{x \to 0} f{\left(x \right)}" + + +def test_latex_log(): + assert latex(log(x)) == r"\log{\left(x \right)}" + assert latex(log(x), ln_notation=True) == r"\ln{\left(x \right)}" + assert latex(log(x) + log(y)) == \ + r"\log{\left(x \right)} + \log{\left(y \right)}" + assert latex(log(x) + log(y), ln_notation=True) == \ + r"\ln{\left(x \right)} + \ln{\left(y \right)}" + assert latex(pow(log(x), x)) == r"\log{\left(x \right)}^{x}" + assert latex(pow(log(x), x), ln_notation=True) == \ + r"\ln{\left(x \right)}^{x}" + + +def test_issue_3568(): + beta = Symbol(r'\beta') + y = beta + x + assert latex(y) in [r'\beta + x', r'x + \beta'] + + beta = Symbol(r'beta') + y = beta + x + assert latex(y) in [r'\beta + x', r'x + \beta'] + + +def test_latex(): + assert latex((2*tau)**Rational(7, 2)) == r"8 \sqrt{2} \tau^{\frac{7}{2}}" + assert latex((2*mu)**Rational(7, 2), mode='equation*') == \ + r"\begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*}" + assert latex((2*mu)**Rational(7, 2), mode='equation', itex=True) == \ + r"$$8 \sqrt{2} \mu^{\frac{7}{2}}$$" + assert latex([2/x, y]) == r"\left[ \frac{2}{x}, \ y\right]" + + +def test_latex_dict(): + d = {Rational(1): 1, x**2: 2, x: 3, x**3: 4} + assert latex(d) == \ + r'\left\{ 1 : 1, \ x : 3, \ x^{2} : 2, \ x^{3} : 4\right\}' + D = Dict(d) + assert latex(D) == \ + r'\left\{ 1 : 1, \ x : 3, \ x^{2} : 2, \ x^{3} : 4\right\}' + + +def test_latex_list(): + ll = [Symbol('omega1'), Symbol('a'), Symbol('alpha')] + assert latex(ll) == r'\left[ \omega_{1}, \ a, \ \alpha\right]' + + +def test_latex_NumberSymbols(): + assert latex(S.Catalan) == "G" + assert latex(S.EulerGamma) == r"\gamma" + assert latex(S.Exp1) == "e" + assert latex(S.GoldenRatio) == r"\phi" + assert latex(S.Pi) == r"\pi" + assert latex(S.TribonacciConstant) == r"\text{TribonacciConstant}" + + +def test_latex_rational(): + # tests issue 3973 + assert latex(-Rational(1, 2)) == r"- \frac{1}{2}" + assert latex(Rational(-1, 2)) == r"- \frac{1}{2}" + assert latex(Rational(1, -2)) == r"- \frac{1}{2}" + assert latex(-Rational(-1, 2)) == r"\frac{1}{2}" + assert latex(-Rational(1, 2)*x) == r"- \frac{x}{2}" + assert latex(-Rational(1, 2)*x + Rational(-2, 3)*y) == \ + r"- \frac{x}{2} - \frac{2 y}{3}" + + +def test_latex_inverse(): + # tests issue 4129 + assert latex(1/x) == r"\frac{1}{x}" + assert latex(1/(x + y)) == r"\frac{1}{x + y}" + + +def test_latex_DiracDelta(): + assert latex(DiracDelta(x)) == r"\delta\left(x\right)" + assert latex(DiracDelta(x)**2) == r"\left(\delta\left(x\right)\right)^{2}" + assert latex(DiracDelta(x, 0)) == r"\delta\left(x\right)" + assert latex(DiracDelta(x, 5)) == \ + r"\delta^{\left( 5 \right)}\left( x \right)" + assert latex(DiracDelta(x, 5)**2) == \ + r"\left(\delta^{\left( 5 \right)}\left( x \right)\right)^{2}" + + +def test_latex_Heaviside(): + assert latex(Heaviside(x)) == r"\theta\left(x\right)" + assert latex(Heaviside(x)**2) == r"\left(\theta\left(x\right)\right)^{2}" + + +def test_latex_KroneckerDelta(): + assert latex(KroneckerDelta(x, y)) == r"\delta_{x y}" + assert latex(KroneckerDelta(x, y + 1)) == r"\delta_{x, y + 1}" + # issue 6578 + assert latex(KroneckerDelta(x + 1, y)) == r"\delta_{y, x + 1}" + assert latex(Pow(KroneckerDelta(x, y), 2, evaluate=False)) == \ + r"\left(\delta_{x y}\right)^{2}" + + +def test_latex_LeviCivita(): + assert latex(LeviCivita(x, y, z)) == r"\varepsilon_{x y z}" + assert latex(LeviCivita(x, y, z)**2) == \ + r"\left(\varepsilon_{x y z}\right)^{2}" + assert latex(LeviCivita(x, y, z + 1)) == r"\varepsilon_{x, y, z + 1}" + assert latex(LeviCivita(x, y + 1, z)) == r"\varepsilon_{x, y + 1, z}" + assert latex(LeviCivita(x + 1, y, z)) == r"\varepsilon_{x + 1, y, z}" + + +def test_mode(): + expr = x + y + assert latex(expr) == r'x + y' + assert latex(expr, mode='plain') == r'x + y' + assert latex(expr, mode='inline') == r'$x + y$' + assert latex( + expr, mode='equation*') == r'\begin{equation*}x + y\end{equation*}' + assert latex( + expr, mode='equation') == r'\begin{equation}x + y\end{equation}' + raises(ValueError, lambda: latex(expr, mode='foo')) + + +def test_latex_mathieu(): + assert latex(mathieuc(x, y, z)) == r"C\left(x, y, z\right)" + assert latex(mathieus(x, y, z)) == r"S\left(x, y, z\right)" + assert latex(mathieuc(x, y, z)**2) == r"C\left(x, y, z\right)^{2}" + assert latex(mathieus(x, y, z)**2) == r"S\left(x, y, z\right)^{2}" + assert latex(mathieucprime(x, y, z)) == r"C^{\prime}\left(x, y, z\right)" + assert latex(mathieusprime(x, y, z)) == r"S^{\prime}\left(x, y, z\right)" + assert latex(mathieucprime(x, y, z)**2) == r"C^{\prime}\left(x, y, z\right)^{2}" + assert latex(mathieusprime(x, y, z)**2) == r"S^{\prime}\left(x, y, z\right)^{2}" + +def test_latex_Piecewise(): + p = Piecewise((x, x < 1), (x**2, True)) + assert latex(p) == r"\begin{cases} x & \text{for}\: x < 1 \\x^{2} &" \ + r" \text{otherwise} \end{cases}" + assert latex(p, itex=True) == \ + r"\begin{cases} x & \text{for}\: x \lt 1 \\x^{2} &" \ + r" \text{otherwise} \end{cases}" + p = Piecewise((x, x < 0), (0, x >= 0)) + assert latex(p) == r'\begin{cases} x & \text{for}\: x < 0 \\0 &' \ + r' \text{otherwise} \end{cases}' + A, B = symbols("A B", commutative=False) + p = Piecewise((A**2, Eq(A, B)), (A*B, True)) + s = r"\begin{cases} A^{2} & \text{for}\: A = B \\A B & \text{otherwise} \end{cases}" + assert latex(p) == s + assert latex(A*p) == r"A \left(%s\right)" % s + assert latex(p*A) == r"\left(%s\right) A" % s + assert latex(Piecewise((x, x < 1), (x**2, x < 2))) == \ + r'\begin{cases} x & ' \ + r'\text{for}\: x < 1 \\x^{2} & \text{for}\: x < 2 \end{cases}' + + +def test_latex_Matrix(): + M = Matrix([[1 + x, y], [y, x - 1]]) + assert latex(M) == \ + r'\left[\begin{matrix}x + 1 & y\\y & x - 1\end{matrix}\right]' + assert latex(M, mode='inline') == \ + r'$\left[\begin{smallmatrix}x + 1 & y\\' \ + r'y & x - 1\end{smallmatrix}\right]$' + assert latex(M, mat_str='array') == \ + r'\left[\begin{array}{cc}x + 1 & y\\y & x - 1\end{array}\right]' + assert latex(M, mat_str='bmatrix') == \ + r'\left[\begin{bmatrix}x + 1 & y\\y & x - 1\end{bmatrix}\right]' + assert latex(M, mat_delim=None, mat_str='bmatrix') == \ + r'\begin{bmatrix}x + 1 & y\\y & x - 1\end{bmatrix}' + + M2 = Matrix(1, 11, range(11)) + assert latex(M2) == \ + r'\left[\begin{array}{ccccccccccc}' \ + r'0 & 1 & 2 & 3 & 4 & 5 & 6 & 7 & 8 & 9 & 10\end{array}\right]' + + +def test_latex_matrix_with_functions(): + t = symbols('t') + theta1 = symbols('theta1', cls=Function) + + M = Matrix([[sin(theta1(t)), cos(theta1(t))], + [cos(theta1(t).diff(t)), sin(theta1(t).diff(t))]]) + + expected = (r'\left[\begin{matrix}\sin{\left(' + r'\theta_{1}{\left(t \right)} \right)} & ' + r'\cos{\left(\theta_{1}{\left(t \right)} \right)' + r'}\\\cos{\left(\frac{d}{d t} \theta_{1}{\left(t ' + r'\right)} \right)} & \sin{\left(\frac{d}{d t} ' + r'\theta_{1}{\left(t \right)} \right' + r')}\end{matrix}\right]') + + assert latex(M) == expected + + +def test_latex_NDimArray(): + x, y, z, w = symbols("x y z w") + + for ArrayType in (ImmutableDenseNDimArray, ImmutableSparseNDimArray, + MutableDenseNDimArray, MutableSparseNDimArray): + # Basic: scalar array + M = ArrayType(x) + + assert latex(M) == r"x" + + M = ArrayType([[1 / x, y], [z, w]]) + M1 = ArrayType([1 / x, y, z]) + + M2 = tensorproduct(M1, M) + M3 = tensorproduct(M, M) + + assert latex(M) == \ + r'\left[\begin{matrix}\frac{1}{x} & y\\z & w\end{matrix}\right]' + assert latex(M1) == \ + r"\left[\begin{matrix}\frac{1}{x} & y & z\end{matrix}\right]" + assert latex(M2) == \ + r"\left[\begin{matrix}" \ + r"\left[\begin{matrix}\frac{1}{x^{2}} & \frac{y}{x}\\\frac{z}{x} & \frac{w}{x}\end{matrix}\right] & " \ + r"\left[\begin{matrix}\frac{y}{x} & y^{2}\\y z & w y\end{matrix}\right] & " \ + r"\left[\begin{matrix}\frac{z}{x} & y z\\z^{2} & w z\end{matrix}\right]" \ + r"\end{matrix}\right]" + assert latex(M3) == \ + r"""\left[\begin{matrix}"""\ + r"""\left[\begin{matrix}\frac{1}{x^{2}} & \frac{y}{x}\\\frac{z}{x} & \frac{w}{x}\end{matrix}\right] & """\ + r"""\left[\begin{matrix}\frac{y}{x} & y^{2}\\y z & w y\end{matrix}\right]\\"""\ + r"""\left[\begin{matrix}\frac{z}{x} & y z\\z^{2} & w z\end{matrix}\right] & """\ + r"""\left[\begin{matrix}\frac{w}{x} & w y\\w z & w^{2}\end{matrix}\right]"""\ + r"""\end{matrix}\right]""" + + Mrow = ArrayType([[x, y, 1/z]]) + Mcolumn = ArrayType([[x], [y], [1/z]]) + Mcol2 = ArrayType([Mcolumn.tolist()]) + + assert latex(Mrow) == \ + r"\left[\left[\begin{matrix}x & y & \frac{1}{z}\end{matrix}\right]\right]" + assert latex(Mcolumn) == \ + r"\left[\begin{matrix}x\\y\\\frac{1}{z}\end{matrix}\right]" + assert latex(Mcol2) == \ + r'\left[\begin{matrix}\left[\begin{matrix}x\\y\\\frac{1}{z}\end{matrix}\right]\end{matrix}\right]' + + +def test_latex_mul_symbol(): + assert latex(4*4**x, mul_symbol='times') == r"4 \times 4^{x}" + assert latex(4*4**x, mul_symbol='dot') == r"4 \cdot 4^{x}" + assert latex(4*4**x, mul_symbol='ldot') == r"4 \,.\, 4^{x}" + + assert latex(4*x, mul_symbol='times') == r"4 \times x" + assert latex(4*x, mul_symbol='dot') == r"4 \cdot x" + assert latex(4*x, mul_symbol='ldot') == r"4 \,.\, x" + + +def test_latex_issue_4381(): + y = 4*4**log(2) + assert latex(y) == r'4 \cdot 4^{\log{\left(2 \right)}}' + assert latex(1/y) == r'\frac{1}{4 \cdot 4^{\log{\left(2 \right)}}}' + + +def test_latex_issue_4576(): + assert latex(Symbol("beta_13_2")) == r"\beta_{13 2}" + assert latex(Symbol("beta_132_20")) == r"\beta_{132 20}" + assert latex(Symbol("beta_13")) == r"\beta_{13}" + assert latex(Symbol("x_a_b")) == r"x_{a b}" + assert latex(Symbol("x_1_2_3")) == r"x_{1 2 3}" + assert latex(Symbol("x_a_b1")) == r"x_{a b1}" + assert latex(Symbol("x_a_1")) == r"x_{a 1}" + assert latex(Symbol("x_1_a")) == r"x_{1 a}" + assert latex(Symbol("x_1^aa")) == r"x^{aa}_{1}" + assert latex(Symbol("x_1__aa")) == r"x^{aa}_{1}" + assert latex(Symbol("x_11^a")) == r"x^{a}_{11}" + assert latex(Symbol("x_11__a")) == r"x^{a}_{11}" + assert latex(Symbol("x_a_a_a_a")) == r"x_{a a a a}" + assert latex(Symbol("x_a_a^a^a")) == r"x^{a a}_{a a}" + assert latex(Symbol("x_a_a__a__a")) == r"x^{a a}_{a a}" + assert latex(Symbol("alpha_11")) == r"\alpha_{11}" + assert latex(Symbol("alpha_11_11")) == r"\alpha_{11 11}" + assert latex(Symbol("alpha_alpha")) == r"\alpha_{\alpha}" + assert latex(Symbol("alpha^aleph")) == r"\alpha^{\aleph}" + assert latex(Symbol("alpha__aleph")) == r"\alpha^{\aleph}" + + +def test_latex_pow_fraction(): + x = Symbol('x') + # Testing exp + assert r'e^{-x}' in latex(exp(-x)/2).replace(' ', '') # Remove Whitespace + + # Testing e^{-x} in case future changes alter behavior of muls or fracs + # In particular current output is \frac{1}{2}e^{- x} but perhaps this will + # change to \frac{e^{-x}}{2} + + # Testing general, non-exp, power + assert r'3^{-x}' in latex(3**-x/2).replace(' ', '') + + +def test_noncommutative(): + A, B, C = symbols('A,B,C', commutative=False) + + assert latex(A*B*C**-1) == r"A B C^{-1}" + assert latex(C**-1*A*B) == r"C^{-1} A B" + assert latex(A*C**-1*B) == r"A C^{-1} B" + + +def test_latex_order(): + expr = x**3 + x**2*y + y**4 + 3*x*y**3 + + assert latex(expr, order='lex') == r"x^{3} + x^{2} y + 3 x y^{3} + y^{4}" + assert latex( + expr, order='rev-lex') == r"y^{4} + 3 x y^{3} + x^{2} y + x^{3}" + assert latex(expr, order='none') == r"x^{3} + y^{4} + y x^{2} + 3 x y^{3}" + + +def test_latex_Lambda(): + assert latex(Lambda(x, x + 1)) == r"\left( x \mapsto x + 1 \right)" + assert latex(Lambda((x, y), x + 1)) == r"\left( \left( x, \ y\right) \mapsto x + 1 \right)" + assert latex(Lambda(x, x)) == r"\left( x \mapsto x \right)" + +def test_latex_PolyElement(): + Ruv, u, v = ring("u,v", ZZ) + Rxyz, x, y, z = ring("x,y,z", Ruv) + + assert latex(x - x) == r"0" + assert latex(x - 1) == r"x - 1" + assert latex(x + 1) == r"x + 1" + + assert latex((u**2 + 3*u*v + 1)*x**2*y + u + 1) == \ + r"\left({u}^{2} + 3 u v + 1\right) {x}^{2} y + u + 1" + assert latex((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x) == \ + r"\left({u}^{2} + 3 u v + 1\right) {x}^{2} y + \left(u + 1\right) x" + assert latex((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x + 1) == \ + r"\left({u}^{2} + 3 u v + 1\right) {x}^{2} y + \left(u + 1\right) x + 1" + assert latex((-u**2 + 3*u*v - 1)*x**2*y - (u + 1)*x - 1) == \ + r"-\left({u}^{2} - 3 u v + 1\right) {x}^{2} y - \left(u + 1\right) x - 1" + + assert latex(-(v**2 + v + 1)*x + 3*u*v + 1) == \ + r"-\left({v}^{2} + v + 1\right) x + 3 u v + 1" + assert latex(-(v**2 + v + 1)*x - 3*u*v + 1) == \ + r"-\left({v}^{2} + v + 1\right) x - 3 u v + 1" + + +def test_latex_FracElement(): + Fuv, u, v = field("u,v", ZZ) + Fxyzt, x, y, z, t = field("x,y,z,t", Fuv) + + assert latex(x - x) == r"0" + assert latex(x - 1) == r"x - 1" + assert latex(x + 1) == r"x + 1" + + assert latex(x/3) == r"\frac{x}{3}" + assert latex(x/z) == r"\frac{x}{z}" + assert latex(x*y/z) == r"\frac{x y}{z}" + assert latex(x/(z*t)) == r"\frac{x}{z t}" + assert latex(x*y/(z*t)) == r"\frac{x y}{z t}" + + assert latex((x - 1)/y) == r"\frac{x - 1}{y}" + assert latex((x + 1)/y) == r"\frac{x + 1}{y}" + assert latex((-x - 1)/y) == r"\frac{-x - 1}{y}" + assert latex((x + 1)/(y*z)) == r"\frac{x + 1}{y z}" + assert latex(-y/(x + 1)) == r"\frac{-y}{x + 1}" + assert latex(y*z/(x + 1)) == r"\frac{y z}{x + 1}" + + assert latex(((u + 1)*x*y + 1)/((v - 1)*z - 1)) == \ + r"\frac{\left(u + 1\right) x y + 1}{\left(v - 1\right) z - 1}" + assert latex(((u + 1)*x*y + 1)/((v - 1)*z - t*u*v - 1)) == \ + r"\frac{\left(u + 1\right) x y + 1}{\left(v - 1\right) z - u v t - 1}" + + +def test_latex_Poly(): + assert latex(Poly(x**2 + 2 * x, x)) == \ + r"\operatorname{Poly}{\left( x^{2} + 2 x, x, domain=\mathbb{Z} \right)}" + assert latex(Poly(x/y, x)) == \ + r"\operatorname{Poly}{\left( \frac{1}{y} x, x, domain=\mathbb{Z}\left(y\right) \right)}" + assert latex(Poly(2.0*x + y)) == \ + r"\operatorname{Poly}{\left( 2.0 x + 1.0 y, x, y, domain=\mathbb{R} \right)}" + + +def test_latex_Poly_order(): + assert latex(Poly([a, 1, b, 2, c, 3], x)) == \ + r'\operatorname{Poly}{\left( a x^{5} + x^{4} + b x^{3} + 2 x^{2} + c'\ + r' x + 3, x, domain=\mathbb{Z}\left[a, b, c\right] \right)}' + assert latex(Poly([a, 1, b+c, 2, 3], x)) == \ + r'\operatorname{Poly}{\left( a x^{4} + x^{3} + \left(b + c\right) '\ + r'x^{2} + 2 x + 3, x, domain=\mathbb{Z}\left[a, b, c\right] \right)}' + assert latex(Poly(a*x**3 + x**2*y - x*y - c*y**3 - b*x*y**2 + y - a*x + b, + (x, y))) == \ + r'\operatorname{Poly}{\left( a x^{3} + x^{2}y - b xy^{2} - xy - '\ + r'a x - c y^{3} + y + b, x, y, domain=\mathbb{Z}\left[a, b, c\right] \right)}' + + +def test_latex_ComplexRootOf(): + assert latex(rootof(x**5 + x + 3, 0)) == \ + r"\operatorname{CRootOf} {\left(x^{5} + x + 3, 0\right)}" + + +def test_latex_RootSum(): + assert latex(RootSum(x**5 + x + 3, sin)) == \ + r"\operatorname{RootSum} {\left(x^{5} + x + 3, \left( x \mapsto \sin{\left(x \right)} \right)\right)}" + + +def test_settings(): + raises(TypeError, lambda: latex(x*y, method="garbage")) + + +def test_latex_numbers(): + assert latex(catalan(n)) == r"C_{n}" + assert latex(catalan(n)**2) == r"C_{n}^{2}" + assert latex(bernoulli(n)) == r"B_{n}" + assert latex(bernoulli(n, x)) == r"B_{n}\left(x\right)" + assert latex(bernoulli(n)**2) == r"B_{n}^{2}" + assert latex(bernoulli(n, x)**2) == r"B_{n}^{2}\left(x\right)" + assert latex(genocchi(n)) == r"G_{n}" + assert latex(genocchi(n, x)) == r"G_{n}\left(x\right)" + assert latex(genocchi(n)**2) == r"G_{n}^{2}" + assert latex(genocchi(n, x)**2) == r"G_{n}^{2}\left(x\right)" + assert latex(bell(n)) == r"B_{n}" + assert latex(bell(n, x)) == r"B_{n}\left(x\right)" + assert latex(bell(n, m, (x, y))) == r"B_{n, m}\left(x, y\right)" + assert latex(bell(n)**2) == r"B_{n}^{2}" + assert latex(bell(n, x)**2) == r"B_{n}^{2}\left(x\right)" + assert latex(bell(n, m, (x, y))**2) == r"B_{n, m}^{2}\left(x, y\right)" + assert latex(fibonacci(n)) == r"F_{n}" + assert latex(fibonacci(n, x)) == r"F_{n}\left(x\right)" + assert latex(fibonacci(n)**2) == r"F_{n}^{2}" + assert latex(fibonacci(n, x)**2) == r"F_{n}^{2}\left(x\right)" + assert latex(lucas(n)) == r"L_{n}" + assert latex(lucas(n)**2) == r"L_{n}^{2}" + assert latex(tribonacci(n)) == r"T_{n}" + assert latex(tribonacci(n, x)) == r"T_{n}\left(x\right)" + assert latex(tribonacci(n)**2) == r"T_{n}^{2}" + assert latex(tribonacci(n, x)**2) == r"T_{n}^{2}\left(x\right)" + assert latex(mobius(n)) == r"\mu\left(n\right)" + assert latex(mobius(n)**2) == r"\mu^{2}\left(n\right)" + + +def test_latex_euler(): + assert latex(euler(n)) == r"E_{n}" + assert latex(euler(n, x)) == r"E_{n}\left(x\right)" + assert latex(euler(n, x)**2) == r"E_{n}^{2}\left(x\right)" + + +def test_lamda(): + assert latex(Symbol('lamda')) == r"\lambda" + assert latex(Symbol('Lamda')) == r"\Lambda" + + +def test_custom_symbol_names(): + x = Symbol('x') + y = Symbol('y') + assert latex(x) == r"x" + assert latex(x, symbol_names={x: "x_i"}) == r"x_i" + assert latex(x + y, symbol_names={x: "x_i"}) == r"x_i + y" + assert latex(x**2, symbol_names={x: "x_i"}) == r"x_i^{2}" + assert latex(x + y, symbol_names={x: "x_i", y: "y_j"}) == r"x_i + y_j" + + +def test_matAdd(): + C = MatrixSymbol('C', 5, 5) + B = MatrixSymbol('B', 5, 5) + + n = symbols("n") + h = MatrixSymbol("h", 1, 1) + + assert latex(C - 2*B) in [r'- 2 B + C', r'C -2 B'] + assert latex(C + 2*B) in [r'2 B + C', r'C + 2 B'] + assert latex(B - 2*C) in [r'B - 2 C', r'- 2 C + B'] + assert latex(B + 2*C) in [r'B + 2 C', r'2 C + B'] + + assert latex(n * h - (-h + h.T) * (h + h.T)) == 'n h - \\left(- h + h^{T}\\right) \\left(h + h^{T}\\right)' + assert latex(MatAdd(MatAdd(h, h), MatAdd(h, h))) == '\\left(h + h\\right) + \\left(h + h\\right)' + assert latex(MatMul(MatMul(h, h), MatMul(h, h))) == '\\left(h h\\right) \\left(h h\\right)' + + +def test_matMul(): + A = MatrixSymbol('A', 5, 5) + B = MatrixSymbol('B', 5, 5) + x = Symbol('x') + assert latex(2*A) == r'2 A' + assert latex(2*x*A) == r'2 x A' + assert latex(-2*A) == r'- 2 A' + assert latex(1.5*A) == r'1.5 A' + assert latex(sqrt(2)*A) == r'\sqrt{2} A' + assert latex(-sqrt(2)*A) == r'- \sqrt{2} A' + assert latex(2*sqrt(2)*x*A) == r'2 \sqrt{2} x A' + assert latex(-2*A*(A + 2*B)) in [r'- 2 A \left(A + 2 B\right)', + r'- 2 A \left(2 B + A\right)'] + + +def test_latex_MatrixSlice(): + n = Symbol('n', integer=True) + x, y, z, w, t, = symbols('x y z w t') + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', 10, 10) + Z = MatrixSymbol('Z', 10, 10) + + assert latex(MatrixSlice(X, (None, None, None), (None, None, None))) == r'X\left[:, :\right]' + assert latex(X[x:x + 1, y:y + 1]) == r'X\left[x:x + 1, y:y + 1\right]' + assert latex(X[x:x + 1:2, y:y + 1:2]) == r'X\left[x:x + 1:2, y:y + 1:2\right]' + assert latex(X[:x, y:]) == r'X\left[:x, y:\right]' + assert latex(X[:x, y:]) == r'X\left[:x, y:\right]' + assert latex(X[x:, :y]) == r'X\left[x:, :y\right]' + assert latex(X[x:y, z:w]) == r'X\left[x:y, z:w\right]' + assert latex(X[x:y:t, w:t:x]) == r'X\left[x:y:t, w:t:x\right]' + assert latex(X[x::y, t::w]) == r'X\left[x::y, t::w\right]' + assert latex(X[:x:y, :t:w]) == r'X\left[:x:y, :t:w\right]' + assert latex(X[::x, ::y]) == r'X\left[::x, ::y\right]' + assert latex(MatrixSlice(X, (0, None, None), (0, None, None))) == r'X\left[:, :\right]' + assert latex(MatrixSlice(X, (None, n, None), (None, n, None))) == r'X\left[:, :\right]' + assert latex(MatrixSlice(X, (0, n, None), (0, n, None))) == r'X\left[:, :\right]' + assert latex(MatrixSlice(X, (0, n, 2), (0, n, 2))) == r'X\left[::2, ::2\right]' + assert latex(X[1:2:3, 4:5:6]) == r'X\left[1:2:3, 4:5:6\right]' + assert latex(X[1:3:5, 4:6:8]) == r'X\left[1:3:5, 4:6:8\right]' + assert latex(X[1:10:2]) == r'X\left[1:10:2, :\right]' + assert latex(Y[:5, 1:9:2]) == r'Y\left[:5, 1:9:2\right]' + assert latex(Y[:5, 1:10:2]) == r'Y\left[:5, 1::2\right]' + assert latex(Y[5, :5:2]) == r'Y\left[5:6, :5:2\right]' + assert latex(X[0:1, 0:1]) == r'X\left[:1, :1\right]' + assert latex(X[0:1:2, 0:1:2]) == r'X\left[:1:2, :1:2\right]' + assert latex((Y + Z)[2:, 2:]) == r'\left(Y + Z\right)\left[2:, 2:\right]' + + +def test_latex_RandomDomain(): + from sympy.stats import Normal, Die, Exponential, pspace, where + from sympy.stats.rv import RandomDomain + + X = Normal('x1', 0, 1) + assert latex(where(X > 0)) == r"\text{Domain: }0 < x_{1} \wedge x_{1} < \infty" + + D = Die('d1', 6) + assert latex(where(D > 4)) == r"\text{Domain: }d_{1} = 5 \vee d_{1} = 6" + + A = Exponential('a', 1) + B = Exponential('b', 1) + assert latex( + pspace(Tuple(A, B)).domain) == \ + r"\text{Domain: }0 \leq a \wedge 0 \leq b \wedge a < \infty \wedge b < \infty" + + assert latex(RandomDomain(FiniteSet(x), FiniteSet(1, 2))) == \ + r'\text{Domain: }\left\{x\right\} \in \left\{1, 2\right\}' + +def test_PrettyPoly(): + from sympy.polys.domains import QQ + F = QQ.frac_field(x, y) + R = QQ[x, y] + + assert latex(F.convert(x/(x + y))) == latex(x/(x + y)) + assert latex(R.convert(x + y)) == latex(x + y) + + +def test_integral_transforms(): + x = Symbol("x") + k = Symbol("k") + f = Function("f") + a = Symbol("a") + b = Symbol("b") + + assert latex(MellinTransform(f(x), x, k)) == \ + r"\mathcal{M}_{x}\left[f{\left(x \right)}\right]\left(k\right)" + assert latex(InverseMellinTransform(f(k), k, x, a, b)) == \ + r"\mathcal{M}^{-1}_{k}\left[f{\left(k \right)}\right]\left(x\right)" + + assert latex(LaplaceTransform(f(x), x, k)) == \ + r"\mathcal{L}_{x}\left[f{\left(x \right)}\right]\left(k\right)" + assert latex(InverseLaplaceTransform(f(k), k, x, (a, b))) == \ + r"\mathcal{L}^{-1}_{k}\left[f{\left(k \right)}\right]\left(x\right)" + + assert latex(FourierTransform(f(x), x, k)) == \ + r"\mathcal{F}_{x}\left[f{\left(x \right)}\right]\left(k\right)" + assert latex(InverseFourierTransform(f(k), k, x)) == \ + r"\mathcal{F}^{-1}_{k}\left[f{\left(k \right)}\right]\left(x\right)" + + assert latex(CosineTransform(f(x), x, k)) == \ + r"\mathcal{COS}_{x}\left[f{\left(x \right)}\right]\left(k\right)" + assert latex(InverseCosineTransform(f(k), k, x)) == \ + r"\mathcal{COS}^{-1}_{k}\left[f{\left(k \right)}\right]\left(x\right)" + + assert latex(SineTransform(f(x), x, k)) == \ + r"\mathcal{SIN}_{x}\left[f{\left(x \right)}\right]\left(k\right)" + assert latex(InverseSineTransform(f(k), k, x)) == \ + r"\mathcal{SIN}^{-1}_{k}\left[f{\left(k \right)}\right]\left(x\right)" + + +def test_PolynomialRingBase(): + from sympy.polys.domains import QQ + assert latex(QQ.old_poly_ring(x, y)) == r"\mathbb{Q}\left[x, y\right]" + assert latex(QQ.old_poly_ring(x, y, order="ilex")) == \ + r"S_<^{-1}\mathbb{Q}\left[x, y\right]" + + +def test_categories(): + from sympy.categories import (Object, IdentityMorphism, + NamedMorphism, Category, Diagram, + DiagramGrid) + + A1 = Object("A1") + A2 = Object("A2") + A3 = Object("A3") + + f1 = NamedMorphism(A1, A2, "f1") + f2 = NamedMorphism(A2, A3, "f2") + id_A1 = IdentityMorphism(A1) + + K1 = Category("K1") + + assert latex(A1) == r"A_{1}" + assert latex(f1) == r"f_{1}:A_{1}\rightarrow A_{2}" + assert latex(id_A1) == r"id:A_{1}\rightarrow A_{1}" + assert latex(f2*f1) == r"f_{2}\circ f_{1}:A_{1}\rightarrow A_{3}" + + assert latex(K1) == r"\mathbf{K_{1}}" + + d = Diagram() + assert latex(d) == r"\emptyset" + + d = Diagram({f1: "unique", f2: S.EmptySet}) + assert latex(d) == r"\left\{ f_{2}\circ f_{1}:A_{1}" \ + r"\rightarrow A_{3} : \emptyset, \ id:A_{1}\rightarrow " \ + r"A_{1} : \emptyset, \ id:A_{2}\rightarrow A_{2} : " \ + r"\emptyset, \ id:A_{3}\rightarrow A_{3} : \emptyset, " \ + r"\ f_{1}:A_{1}\rightarrow A_{2} : \left\{unique\right\}, " \ + r"\ f_{2}:A_{2}\rightarrow A_{3} : \emptyset\right\}" + + d = Diagram({f1: "unique", f2: S.EmptySet}, {f2 * f1: "unique"}) + assert latex(d) == r"\left\{ f_{2}\circ f_{1}:A_{1}" \ + r"\rightarrow A_{3} : \emptyset, \ id:A_{1}\rightarrow " \ + r"A_{1} : \emptyset, \ id:A_{2}\rightarrow A_{2} : " \ + r"\emptyset, \ id:A_{3}\rightarrow A_{3} : \emptyset, " \ + r"\ f_{1}:A_{1}\rightarrow A_{2} : \left\{unique\right\}," \ + r" \ f_{2}:A_{2}\rightarrow A_{3} : \emptyset\right\}" \ + r"\Longrightarrow \left\{ f_{2}\circ f_{1}:A_{1}" \ + r"\rightarrow A_{3} : \left\{unique\right\}\right\}" + + # A linear diagram. + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + d = Diagram([f, g]) + grid = DiagramGrid(d) + + assert latex(grid) == r"\begin{array}{cc}" + "\n" \ + r"A & B \\" + "\n" \ + r" & C " + "\n" \ + r"\end{array}" + "\n" + + +def test_Modules(): + from sympy.polys.domains import QQ + from sympy.polys.agca import homomorphism + + R = QQ.old_poly_ring(x, y) + F = R.free_module(2) + M = F.submodule([x, y], [1, x**2]) + + assert latex(F) == r"{\mathbb{Q}\left[x, y\right]}^{2}" + assert latex(M) == \ + r"\left\langle {\left[ {x},{y} \right]},{\left[ {1},{x^{2}} \right]} \right\rangle" + + I = R.ideal(x**2, y) + assert latex(I) == r"\left\langle {x^{2}},{y} \right\rangle" + + Q = F / M + assert latex(Q) == \ + r"\frac{{\mathbb{Q}\left[x, y\right]}^{2}}{\left\langle {\left[ {x},"\ + r"{y} \right]},{\left[ {1},{x^{2}} \right]} \right\rangle}" + assert latex(Q.submodule([1, x**3/2], [2, y])) == \ + r"\left\langle {{\left[ {1},{\frac{x^{3}}{2}} \right]} + {\left"\ + r"\langle {\left[ {x},{y} \right]},{\left[ {1},{x^{2}} \right]} "\ + r"\right\rangle}},{{\left[ {2},{y} \right]} + {\left\langle {\left[ "\ + r"{x},{y} \right]},{\left[ {1},{x^{2}} \right]} \right\rangle}} \right\rangle" + + h = homomorphism(QQ.old_poly_ring(x).free_module(2), + QQ.old_poly_ring(x).free_module(2), [0, 0]) + + assert latex(h) == \ + r"{\left[\begin{matrix}0 & 0\\0 & 0\end{matrix}\right]} : "\ + r"{{\mathbb{Q}\left[x\right]}^{2}} \to {{\mathbb{Q}\left[x\right]}^{2}}" + + +def test_QuotientRing(): + from sympy.polys.domains import QQ + R = QQ.old_poly_ring(x)/[x**2 + 1] + + assert latex(R) == \ + r"\frac{\mathbb{Q}\left[x\right]}{\left\langle {x^{2} + 1} \right\rangle}" + assert latex(R.one) == r"{1} + {\left\langle {x^{2} + 1} \right\rangle}" + + +def test_Tr(): + #TODO: Handle indices + A, B = symbols('A B', commutative=False) + t = Tr(A*B) + assert latex(t) == r'\operatorname{tr}\left(A B\right)' + + +def test_Determinant(): + from sympy.matrices import Determinant, Inverse, BlockMatrix, OneMatrix, ZeroMatrix + m = Matrix(((1, 2), (3, 4))) + assert latex(Determinant(m)) == '\\left|{\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}}\\right|' + assert latex(Determinant(Inverse(m))) == \ + '\\left|{\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right]^{-1}}\\right|' + X = MatrixSymbol('X', 2, 2) + assert latex(Determinant(X)) == '\\left|{X}\\right|' + assert latex(Determinant(X + m)) == \ + '\\left|{\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] + X}\\right|' + assert latex(Determinant(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + '\\left|{\\begin{matrix}1 & X\\\\\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] & 0\\end{matrix}}\\right|' + + +def test_Adjoint(): + from sympy.matrices import Adjoint, Inverse, Transpose + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert latex(Adjoint(X)) == r'X^{\dagger}' + assert latex(Adjoint(X + Y)) == r'\left(X + Y\right)^{\dagger}' + assert latex(Adjoint(X) + Adjoint(Y)) == r'X^{\dagger} + Y^{\dagger}' + assert latex(Adjoint(X*Y)) == r'\left(X Y\right)^{\dagger}' + assert latex(Adjoint(Y)*Adjoint(X)) == r'Y^{\dagger} X^{\dagger}' + assert latex(Adjoint(X**2)) == r'\left(X^{2}\right)^{\dagger}' + assert latex(Adjoint(X)**2) == r'\left(X^{\dagger}\right)^{2}' + assert latex(Adjoint(Inverse(X))) == r'\left(X^{-1}\right)^{\dagger}' + assert latex(Inverse(Adjoint(X))) == r'\left(X^{\dagger}\right)^{-1}' + assert latex(Adjoint(Transpose(X))) == r'\left(X^{T}\right)^{\dagger}' + assert latex(Transpose(Adjoint(X))) == r'\left(X^{\dagger}\right)^{T}' + assert latex(Transpose(Adjoint(X) + Y)) == r'\left(X^{\dagger} + Y\right)^{T}' + m = Matrix(((1, 2), (3, 4))) + assert latex(Adjoint(m)) == '\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right]^{\\dagger}' + assert latex(Adjoint(m+X)) == \ + '\\left(\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] + X\\right)^{\\dagger}' + from sympy.matrices import BlockMatrix, OneMatrix, ZeroMatrix + assert latex(Adjoint(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + '\\left[\\begin{matrix}1 & X\\\\\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] & 0\\end{matrix}\\right]^{\\dagger}' + # Issue 20959 + Mx = MatrixSymbol('M^x', 2, 2) + assert latex(Adjoint(Mx)) == r'\left(M^{x}\right)^{\dagger}' + + # adjoint style + assert latex(Adjoint(X), adjoint_style="star") == r'X^{\ast}' + assert latex(Adjoint(X + Y), adjoint_style="hermitian") == r'\left(X + Y\right)^{\mathsf{H}}' + assert latex(Adjoint(X) + Adjoint(Y), adjoint_style="dagger") == r'X^{\dagger} + Y^{\dagger}' + assert latex(Adjoint(Y)*Adjoint(X)) == r'Y^{\dagger} X^{\dagger}' + assert latex(Adjoint(X**2), adjoint_style="star") == r'\left(X^{2}\right)^{\ast}' + assert latex(Adjoint(X)**2, adjoint_style="hermitian") == r'\left(X^{\mathsf{H}}\right)^{2}' + +def test_Transpose(): + from sympy.matrices import Transpose, MatPow, HadamardPower + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert latex(Transpose(X)) == r'X^{T}' + assert latex(Transpose(X + Y)) == r'\left(X + Y\right)^{T}' + + assert latex(Transpose(HadamardPower(X, 2))) == r'\left(X^{\circ {2}}\right)^{T}' + assert latex(HadamardPower(Transpose(X), 2)) == r'\left(X^{T}\right)^{\circ {2}}' + assert latex(Transpose(MatPow(X, 2))) == r'\left(X^{2}\right)^{T}' + assert latex(MatPow(Transpose(X), 2)) == r'\left(X^{T}\right)^{2}' + m = Matrix(((1, 2), (3, 4))) + assert latex(Transpose(m)) == '\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right]^{T}' + assert latex(Transpose(m+X)) == \ + '\\left(\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] + X\\right)^{T}' + from sympy.matrices import BlockMatrix, OneMatrix, ZeroMatrix + assert latex(Transpose(BlockMatrix(((OneMatrix(2, 2), X), + (m, ZeroMatrix(2, 2)))))) == \ + '\\left[\\begin{matrix}1 & X\\\\\\left[\\begin{matrix}1 & 2\\\\3 & 4\\end{matrix}\\right] & 0\\end{matrix}\\right]^{T}' + # Issue 20959 + Mx = MatrixSymbol('M^x', 2, 2) + assert latex(Transpose(Mx)) == r'\left(M^{x}\right)^{T}' + + +def test_Hadamard(): + from sympy.matrices import HadamardProduct, HadamardPower + from sympy.matrices.expressions import MatAdd, MatMul, MatPow + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert latex(HadamardProduct(X, Y*Y)) == r'X \circ Y^{2}' + assert latex(HadamardProduct(X, Y)*Y) == r'\left(X \circ Y\right) Y' + + assert latex(HadamardPower(X, 2)) == r'X^{\circ {2}}' + assert latex(HadamardPower(X, -1)) == r'X^{\circ \left({-1}\right)}' + assert latex(HadamardPower(MatAdd(X, Y), 2)) == \ + r'\left(X + Y\right)^{\circ {2}}' + assert latex(HadamardPower(MatMul(X, Y), 2)) == \ + r'\left(X Y\right)^{\circ {2}}' + + assert latex(HadamardPower(MatPow(X, -1), -1)) == \ + r'\left(X^{-1}\right)^{\circ \left({-1}\right)}' + assert latex(MatPow(HadamardPower(X, -1), -1)) == \ + r'\left(X^{\circ \left({-1}\right)}\right)^{-1}' + + assert latex(HadamardPower(X, n+1)) == \ + r'X^{\circ \left({n + 1}\right)}' + + +def test_MatPow(): + from sympy.matrices.expressions import MatPow + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert latex(MatPow(X, 2)) == 'X^{2}' + assert latex(MatPow(X*X, 2)) == '\\left(X^{2}\\right)^{2}' + assert latex(MatPow(X*Y, 2)) == '\\left(X Y\\right)^{2}' + assert latex(MatPow(X + Y, 2)) == '\\left(X + Y\\right)^{2}' + assert latex(MatPow(X + X, 2)) == '\\left(2 X\\right)^{2}' + # Issue 20959 + Mx = MatrixSymbol('M^x', 2, 2) + assert latex(MatPow(Mx, 2)) == r'\left(M^{x}\right)^{2}' + + +def test_ElementwiseApplyFunction(): + X = MatrixSymbol('X', 2, 2) + expr = (X.T*X).applyfunc(sin) + assert latex(expr) == r"{\left( d \mapsto \sin{\left(d \right)} \right)}_{\circ}\left({X^{T} X}\right)" + expr = X.applyfunc(Lambda(x, 1/x)) + assert latex(expr) == r'{\left( x \mapsto \frac{1}{x} \right)}_{\circ}\left({X}\right)' + + +def test_ZeroMatrix(): + from sympy.matrices.expressions.special import ZeroMatrix + assert latex(ZeroMatrix(1, 1), mat_symbol_style='plain') == r"0" + assert latex(ZeroMatrix(1, 1), mat_symbol_style='bold') == r"\mathbf{0}" + + +def test_OneMatrix(): + from sympy.matrices.expressions.special import OneMatrix + assert latex(OneMatrix(3, 4), mat_symbol_style='plain') == r"1" + assert latex(OneMatrix(3, 4), mat_symbol_style='bold') == r"\mathbf{1}" + + +def test_Identity(): + from sympy.matrices.expressions.special import Identity + assert latex(Identity(1), mat_symbol_style='plain') == r"\mathbb{I}" + assert latex(Identity(1), mat_symbol_style='bold') == r"\mathbf{I}" + + +def test_latex_DFT_IDFT(): + from sympy.matrices.expressions.fourier import DFT, IDFT + assert latex(DFT(13)) == r"\text{DFT}_{13}" + assert latex(IDFT(x)) == r"\text{IDFT}_{x}" + + +def test_boolean_args_order(): + syms = symbols('a:f') + + expr = And(*syms) + assert latex(expr) == r'a \wedge b \wedge c \wedge d \wedge e \wedge f' + + expr = Or(*syms) + assert latex(expr) == r'a \vee b \vee c \vee d \vee e \vee f' + + expr = Equivalent(*syms) + assert latex(expr) == \ + r'a \Leftrightarrow b \Leftrightarrow c \Leftrightarrow d \Leftrightarrow e \Leftrightarrow f' + + expr = Xor(*syms) + assert latex(expr) == \ + r'a \veebar b \veebar c \veebar d \veebar e \veebar f' + + +def test_imaginary(): + i = sqrt(-1) + assert latex(i) == r'i' + + +def test_builtins_without_args(): + assert latex(sin) == r'\sin' + assert latex(cos) == r'\cos' + assert latex(tan) == r'\tan' + assert latex(log) == r'\log' + assert latex(Ei) == r'\operatorname{Ei}' + assert latex(zeta) == r'\zeta' + + +def test_latex_greek_functions(): + # bug because capital greeks that have roman equivalents should not use + # \Alpha, \Beta, \Eta, etc. + s = Function('Alpha') + assert latex(s) == r'\mathrm{A}' + assert latex(s(x)) == r'\mathrm{A}{\left(x \right)}' + s = Function('Beta') + assert latex(s) == r'\mathrm{B}' + s = Function('Eta') + assert latex(s) == r'\mathrm{H}' + assert latex(s(x)) == r'\mathrm{H}{\left(x \right)}' + + # bug because sympy.core.numbers.Pi is special + p = Function('Pi') + # assert latex(p(x)) == r'\Pi{\left(x \right)}' + assert latex(p) == r'\Pi' + + # bug because not all greeks are included + c = Function('chi') + assert latex(c(x)) == r'\chi{\left(x \right)}' + assert latex(c) == r'\chi' + + +def test_translate(): + s = 'Alpha' + assert translate(s) == r'\mathrm{A}' + s = 'Beta' + assert translate(s) == r'\mathrm{B}' + s = 'Eta' + assert translate(s) == r'\mathrm{H}' + s = 'omicron' + assert translate(s) == r'o' + s = 'Pi' + assert translate(s) == r'\Pi' + s = 'pi' + assert translate(s) == r'\pi' + s = 'LamdaHatDOT' + assert translate(s) == r'\dot{\hat{\Lambda}}' + + +def test_other_symbols(): + from sympy.printing.latex import other_symbols + for s in other_symbols: + assert latex(symbols(s)) == r"" "\\" + s + + +def test_modifiers(): + # Test each modifier individually in the simplest case + # (with funny capitalizations) + assert latex(symbols("xMathring")) == r"\mathring{x}" + assert latex(symbols("xCheck")) == r"\check{x}" + assert latex(symbols("xBreve")) == r"\breve{x}" + assert latex(symbols("xAcute")) == r"\acute{x}" + assert latex(symbols("xGrave")) == r"\grave{x}" + assert latex(symbols("xTilde")) == r"\tilde{x}" + assert latex(symbols("xPrime")) == r"{x}'" + assert latex(symbols("xddDDot")) == r"\ddddot{x}" + assert latex(symbols("xDdDot")) == r"\dddot{x}" + assert latex(symbols("xDDot")) == r"\ddot{x}" + assert latex(symbols("xBold")) == r"\boldsymbol{x}" + assert latex(symbols("xnOrM")) == r"\left\|{x}\right\|" + assert latex(symbols("xAVG")) == r"\left\langle{x}\right\rangle" + assert latex(symbols("xHat")) == r"\hat{x}" + assert latex(symbols("xDot")) == r"\dot{x}" + assert latex(symbols("xBar")) == r"\bar{x}" + assert latex(symbols("xVec")) == r"\vec{x}" + assert latex(symbols("xAbs")) == r"\left|{x}\right|" + assert latex(symbols("xMag")) == r"\left|{x}\right|" + assert latex(symbols("xPrM")) == r"{x}'" + assert latex(symbols("xBM")) == r"\boldsymbol{x}" + # Test strings that are *only* the names of modifiers + assert latex(symbols("Mathring")) == r"Mathring" + assert latex(symbols("Check")) == r"Check" + assert latex(symbols("Breve")) == r"Breve" + assert latex(symbols("Acute")) == r"Acute" + assert latex(symbols("Grave")) == r"Grave" + assert latex(symbols("Tilde")) == r"Tilde" + assert latex(symbols("Prime")) == r"Prime" + assert latex(symbols("DDot")) == r"\dot{D}" + assert latex(symbols("Bold")) == r"Bold" + assert latex(symbols("NORm")) == r"NORm" + assert latex(symbols("AVG")) == r"AVG" + assert latex(symbols("Hat")) == r"Hat" + assert latex(symbols("Dot")) == r"Dot" + assert latex(symbols("Bar")) == r"Bar" + assert latex(symbols("Vec")) == r"Vec" + assert latex(symbols("Abs")) == r"Abs" + assert latex(symbols("Mag")) == r"Mag" + assert latex(symbols("PrM")) == r"PrM" + assert latex(symbols("BM")) == r"BM" + assert latex(symbols("hbar")) == r"\hbar" + # Check a few combinations + assert latex(symbols("xvecdot")) == r"\dot{\vec{x}}" + assert latex(symbols("xDotVec")) == r"\vec{\dot{x}}" + assert latex(symbols("xHATNorm")) == r"\left\|{\hat{x}}\right\|" + # Check a couple big, ugly combinations + assert latex(symbols('xMathringBm_yCheckPRM__zbreveAbs')) == \ + r"\boldsymbol{\mathring{x}}^{\left|{\breve{z}}\right|}_{{\check{y}}'}" + assert latex(symbols('alphadothat_nVECDOT__tTildePrime')) == \ + r"\hat{\dot{\alpha}}^{{\tilde{t}}'}_{\dot{\vec{n}}}" + + +def test_greek_symbols(): + assert latex(Symbol('alpha')) == r'\alpha' + assert latex(Symbol('beta')) == r'\beta' + assert latex(Symbol('gamma')) == r'\gamma' + assert latex(Symbol('delta')) == r'\delta' + assert latex(Symbol('epsilon')) == r'\epsilon' + assert latex(Symbol('zeta')) == r'\zeta' + assert latex(Symbol('eta')) == r'\eta' + assert latex(Symbol('theta')) == r'\theta' + assert latex(Symbol('iota')) == r'\iota' + assert latex(Symbol('kappa')) == r'\kappa' + assert latex(Symbol('lambda')) == r'\lambda' + assert latex(Symbol('mu')) == r'\mu' + assert latex(Symbol('nu')) == r'\nu' + assert latex(Symbol('xi')) == r'\xi' + assert latex(Symbol('omicron')) == r'o' + assert latex(Symbol('pi')) == r'\pi' + assert latex(Symbol('rho')) == r'\rho' + assert latex(Symbol('sigma')) == r'\sigma' + assert latex(Symbol('tau')) == r'\tau' + assert latex(Symbol('upsilon')) == r'\upsilon' + assert latex(Symbol('phi')) == r'\phi' + assert latex(Symbol('chi')) == r'\chi' + assert latex(Symbol('psi')) == r'\psi' + assert latex(Symbol('omega')) == r'\omega' + + assert latex(Symbol('Alpha')) == r'\mathrm{A}' + assert latex(Symbol('Beta')) == r'\mathrm{B}' + assert latex(Symbol('Gamma')) == r'\Gamma' + assert latex(Symbol('Delta')) == r'\Delta' + assert latex(Symbol('Epsilon')) == r'\mathrm{E}' + assert latex(Symbol('Zeta')) == r'\mathrm{Z}' + assert latex(Symbol('Eta')) == r'\mathrm{H}' + assert latex(Symbol('Theta')) == r'\Theta' + assert latex(Symbol('Iota')) == r'\mathrm{I}' + assert latex(Symbol('Kappa')) == r'\mathrm{K}' + assert latex(Symbol('Lambda')) == r'\Lambda' + assert latex(Symbol('Mu')) == r'\mathrm{M}' + assert latex(Symbol('Nu')) == r'\mathrm{N}' + assert latex(Symbol('Xi')) == r'\Xi' + assert latex(Symbol('Omicron')) == r'\mathrm{O}' + assert latex(Symbol('Pi')) == r'\Pi' + assert latex(Symbol('Rho')) == r'\mathrm{P}' + assert latex(Symbol('Sigma')) == r'\Sigma' + assert latex(Symbol('Tau')) == r'\mathrm{T}' + assert latex(Symbol('Upsilon')) == r'\Upsilon' + assert latex(Symbol('Phi')) == r'\Phi' + assert latex(Symbol('Chi')) == r'\mathrm{X}' + assert latex(Symbol('Psi')) == r'\Psi' + assert latex(Symbol('Omega')) == r'\Omega' + + assert latex(Symbol('varepsilon')) == r'\varepsilon' + assert latex(Symbol('varkappa')) == r'\varkappa' + assert latex(Symbol('varphi')) == r'\varphi' + assert latex(Symbol('varpi')) == r'\varpi' + assert latex(Symbol('varrho')) == r'\varrho' + assert latex(Symbol('varsigma')) == r'\varsigma' + assert latex(Symbol('vartheta')) == r'\vartheta' + + +def test_fancyset_symbols(): + assert latex(S.Rationals) == r'\mathbb{Q}' + assert latex(S.Naturals) == r'\mathbb{N}' + assert latex(S.Naturals0) == r'\mathbb{N}_0' + assert latex(S.Integers) == r'\mathbb{Z}' + assert latex(S.Reals) == r'\mathbb{R}' + assert latex(S.Complexes) == r'\mathbb{C}' + + +@XFAIL +def test_builtin_without_args_mismatched_names(): + assert latex(CosineTransform) == r'\mathcal{COS}' + + +def test_builtin_no_args(): + assert latex(Chi) == r'\operatorname{Chi}' + assert latex(beta) == r'\operatorname{B}' + assert latex(gamma) == r'\Gamma' + assert latex(KroneckerDelta) == r'\delta' + assert latex(DiracDelta) == r'\delta' + assert latex(lowergamma) == r'\gamma' + + +def test_issue_6853(): + p = Function('Pi') + assert latex(p(x)) == r"\Pi{\left(x \right)}" + + +def test_Mul(): + e = Mul(-2, x + 1, evaluate=False) + assert latex(e) == r'- 2 \left(x + 1\right)' + e = Mul(2, x + 1, evaluate=False) + assert latex(e) == r'2 \left(x + 1\right)' + e = Mul(S.Half, x + 1, evaluate=False) + assert latex(e) == r'\frac{x + 1}{2}' + e = Mul(y, x + 1, evaluate=False) + assert latex(e) == r'y \left(x + 1\right)' + e = Mul(-y, x + 1, evaluate=False) + assert latex(e) == r'- y \left(x + 1\right)' + e = Mul(-2, x + 1) + assert latex(e) == r'- 2 x - 2' + e = Mul(2, x + 1) + assert latex(e) == r'2 x + 2' + + +def test_Pow(): + e = Pow(2, 2, evaluate=False) + assert latex(e) == r'2^{2}' + assert latex(x**(Rational(-1, 3))) == r'\frac{1}{\sqrt[3]{x}}' + x2 = Symbol(r'x^2') + assert latex(x2**2) == r'\left(x^{2}\right)^{2}' + # Issue 11011 + assert latex(S('1.453e4500')**x) == r'{1.453 \cdot 10^{4500}}^{x}' + + +def test_issue_7180(): + assert latex(Equivalent(x, y)) == r"x \Leftrightarrow y" + assert latex(Not(Equivalent(x, y))) == r"x \not\Leftrightarrow y" + + +def test_issue_8409(): + assert latex(S.Half**n) == r"\left(\frac{1}{2}\right)^{n}" + + +def test_issue_8470(): + from sympy.parsing.sympy_parser import parse_expr + e = parse_expr("-B*A", evaluate=False) + assert latex(e) == r"A \left(- B\right)" + + +def test_issue_15439(): + x = MatrixSymbol('x', 2, 2) + y = MatrixSymbol('y', 2, 2) + assert latex((x * y).subs(y, -y)) == r"x \left(- y\right)" + assert latex((x * y).subs(y, -2*y)) == r"x \left(- 2 y\right)" + assert latex((x * y).subs(x, -x)) == r"\left(- x\right) y" + + +def test_issue_2934(): + assert latex(Symbol(r'\frac{a_1}{b_1}')) == r'\frac{a_1}{b_1}' + + +def test_issue_10489(): + latexSymbolWithBrace = r'C_{x_{0}}' + s = Symbol(latexSymbolWithBrace) + assert latex(s) == latexSymbolWithBrace + assert latex(cos(s)) == r'\cos{\left(C_{x_{0}} \right)}' + + +def test_issue_12886(): + m__1, l__1 = symbols('m__1, l__1') + assert latex(m__1**2 + l__1**2) == \ + r'\left(l^{1}\right)^{2} + \left(m^{1}\right)^{2}' + + +def test_issue_13559(): + from sympy.parsing.sympy_parser import parse_expr + expr = parse_expr('5/1', evaluate=False) + assert latex(expr) == r"\frac{5}{1}" + + +def test_issue_13651(): + expr = c + Mul(-1, a + b, evaluate=False) + assert latex(expr) == r"c - \left(a + b\right)" + + +def test_latex_UnevaluatedExpr(): + x = symbols("x") + he = UnevaluatedExpr(1/x) + assert latex(he) == latex(1/x) == r"\frac{1}{x}" + assert latex(he**2) == r"\left(\frac{1}{x}\right)^{2}" + assert latex(he + 1) == r"1 + \frac{1}{x}" + assert latex(x*he) == r"x \frac{1}{x}" + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert latex(A[0, 0]) == r"{A}_{0,0}" + assert latex(3 * A[0, 0]) == r"3 {A}_{0,0}" + + F = C[0, 0].subs(C, A - B) + assert latex(F) == r"{\left(A - B\right)}_{0,0}" + + i, j, k = symbols("i j k") + M = MatrixSymbol("M", k, k) + N = MatrixSymbol("N", k, k) + assert latex((M*N)[i, j]) == \ + r'\sum_{i_{1}=0}^{k - 1} {M}_{i,i_{1}} {N}_{i_{1},j}' + + X_a = MatrixSymbol('X_a', 3, 3) + assert latex(X_a[0, 0]) == r"{X_{a}}_{0,0}" + + +def test_MatrixSymbol_printing(): + # test cases for issue #14237 + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + C = MatrixSymbol("C", 3, 3) + + assert latex(-A) == r"- A" + assert latex(A - A*B - B) == r"A - A B - B" + assert latex(-A*B - A*B*C - B) == r"- A B - A B C - B" + + +def test_DotProduct_printing(): + X = MatrixSymbol('X', 3, 1) + Y = MatrixSymbol('Y', 3, 1) + a = Symbol('a') + assert latex(DotProduct(X, Y)) == r"X \cdot Y" + assert latex(DotProduct(a * X, Y)) == r"a X \cdot Y" + assert latex(a * DotProduct(X, Y)) == r"a \left(X \cdot Y\right)" + + +def test_KroneckerProduct_printing(): + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 2, 2) + assert latex(KroneckerProduct(A, B)) == r'A \otimes B' + + +def test_Series_printing(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(t*x**2 - t**w*x + w, t - y, y) + assert latex(Series(tf1, tf2)) == \ + r'\left(\frac{x y^{2} - z}{- t^{3} + y^{3}}\right) \left(\frac{x - y}{x + y}\right)' + assert latex(Series(tf1, tf2, tf3)) == \ + r'\left(\frac{x y^{2} - z}{- t^{3} + y^{3}}\right) \left(\frac{x - y}{x + y}\right) \left(\frac{t x^{2} - t^{w} x + w}{t - y}\right)' + assert latex(Series(-tf2, tf1)) == \ + r'\left(\frac{- x + y}{x + y}\right) \left(\frac{x y^{2} - z}{- t^{3} + y^{3}}\right)' + + M_1 = Matrix([[5/s], [5/(2*s)]]) + T_1 = TransferFunctionMatrix.from_Matrix(M_1, s) + M_2 = Matrix([[5, 6*s**3]]) + T_2 = TransferFunctionMatrix.from_Matrix(M_2, s) + # Brackets + assert latex(T_1*(T_2 + T_2)) == \ + r'\left[\begin{matrix}\frac{5}{s}\\\frac{5}{2 s}\end{matrix}\right]_\tau\cdot\left(\left[\begin{matrix}\frac{5}{1} &' \ + r' \frac{6 s^{3}}{1}\end{matrix}\right]_\tau + \left[\begin{matrix}\frac{5}{1} & \frac{6 s^{3}}{1}\end{matrix}\right]_\tau\right)' \ + == latex(MIMOSeries(MIMOParallel(T_2, T_2), T_1)) + # No Brackets + M_3 = Matrix([[5, 6], [6, 5/s]]) + T_3 = TransferFunctionMatrix.from_Matrix(M_3, s) + assert latex(T_1*T_2 + T_3) == r'\left[\begin{matrix}\frac{5}{s}\\\frac{5}{2 s}\end{matrix}\right]_\tau\cdot\left[\begin{matrix}' \ + r'\frac{5}{1} & \frac{6 s^{3}}{1}\end{matrix}\right]_\tau + \left[\begin{matrix}\frac{5}{1} & \frac{6}{1}\\\frac{6}{1} & ' \ + r'\frac{5}{s}\end{matrix}\right]_\tau' == latex(MIMOParallel(MIMOSeries(T_2, T_1), T_3)) + + +def test_TransferFunction_printing(): + tf1 = TransferFunction(x - 1, x + 1, x) + assert latex(tf1) == r"\frac{x - 1}{x + 1}" + tf2 = TransferFunction(x + 1, 2 - y, x) + assert latex(tf2) == r"\frac{x + 1}{2 - y}" + tf3 = TransferFunction(y, y**2 + 2*y + 3, y) + assert latex(tf3) == r"\frac{y}{y^{2} + 2 y + 3}" + + +def test_Parallel_printing(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + assert latex(Parallel(tf1, tf2)) == \ + r'\frac{x y^{2} - z}{- t^{3} + y^{3}} + \frac{x - y}{x + y}' + assert latex(Parallel(-tf2, tf1)) == \ + r'\frac{- x + y}{x + y} + \frac{x y^{2} - z}{- t^{3} + y^{3}}' + + M_1 = Matrix([[5, 6], [6, 5/s]]) + T_1 = TransferFunctionMatrix.from_Matrix(M_1, s) + M_2 = Matrix([[5/s, 6], [6, 5/(s - 1)]]) + T_2 = TransferFunctionMatrix.from_Matrix(M_2, s) + M_3 = Matrix([[6, 5/(s*(s - 1))], [5, 6]]) + T_3 = TransferFunctionMatrix.from_Matrix(M_3, s) + assert latex(T_1 + T_2 + T_3) == r'\left[\begin{matrix}\frac{5}{1} & \frac{6}{1}\\\frac{6}{1} & \frac{5}{s}\end{matrix}\right]' \ + r'_\tau + \left[\begin{matrix}\frac{5}{s} & \frac{6}{1}\\\frac{6}{1} & \frac{5}{s - 1}\end{matrix}\right]_\tau + \left[\begin{matrix}' \ + r'\frac{6}{1} & \frac{5}{s \left(s - 1\right)}\\\frac{5}{1} & \frac{6}{1}\end{matrix}\right]_\tau' \ + == latex(MIMOParallel(T_1, T_2, T_3)) == latex(MIMOParallel(T_1, MIMOParallel(T_2, T_3))) == latex(MIMOParallel(MIMOParallel(T_1, T_2), T_3)) + + +def test_TransferFunctionMatrix_printing(): + tf1 = TransferFunction(p, p + x, p) + tf2 = TransferFunction(-s + p, p + s, p) + tf3 = TransferFunction(p, y**2 + 2*y + 3, p) + assert latex(TransferFunctionMatrix([[tf1], [tf2]])) == \ + r'\left[\begin{matrix}\frac{p}{p + x}\\\frac{p - s}{p + s}\end{matrix}\right]_\tau' + assert latex(TransferFunctionMatrix([[tf1, tf2], [tf3, -tf1]])) == \ + r'\left[\begin{matrix}\frac{p}{p + x} & \frac{p - s}{p + s}\\\frac{p}{y^{2} + 2 y + 3} & \frac{\left(-1\right) p}{p + x}\end{matrix}\right]_\tau' + + +def test_Feedback_printing(): + tf1 = TransferFunction(p, p + x, p) + tf2 = TransferFunction(-s + p, p + s, p) + # Negative Feedback (Default) + assert latex(Feedback(tf1, tf2)) == \ + r'\frac{\frac{p}{p + x}}{\frac{1}{1} + \left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}' + assert latex(Feedback(tf1*tf2, TransferFunction(1, 1, p))) == \ + r'\frac{\left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}{\frac{1}{1} + \left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}' + # Positive Feedback + assert latex(Feedback(tf1, tf2, 1)) == \ + r'\frac{\frac{p}{p + x}}{\frac{1}{1} - \left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}' + assert latex(Feedback(tf1*tf2, sign=1)) == \ + r'\frac{\left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}{\frac{1}{1} - \left(\frac{p}{p + x}\right) \left(\frac{p - s}{p + s}\right)}' + + +def test_MIMOFeedback_printing(): + tf1 = TransferFunction(1, s, s) + tf2 = TransferFunction(s, s**2 - 1, s) + tf3 = TransferFunction(s, s - 1, s) + tf4 = TransferFunction(s**2, s**2 - 1, s) + + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf3, tf4]]) + tfm_2 = TransferFunctionMatrix([[tf4, tf3], [tf2, tf1]]) + + # Negative Feedback (Default) + assert latex(MIMOFeedback(tfm_1, tfm_2)) == \ + r'\left(I_{\tau} + \left[\begin{matrix}\frac{1}{s} & \frac{s}{s^{2} - 1}\\\frac{s}{s - 1} & \frac{s^{2}}{s^{2} - 1}\end{matrix}\right]_\tau\cdot\left[' \ + r'\begin{matrix}\frac{s^{2}}{s^{2} - 1} & \frac{s}{s - 1}\\\frac{s}{s^{2} - 1} & \frac{1}{s}\end{matrix}\right]_\tau\right)^{-1} \cdot \left[\begin{matrix}' \ + r'\frac{1}{s} & \frac{s}{s^{2} - 1}\\\frac{s}{s - 1} & \frac{s^{2}}{s^{2} - 1}\end{matrix}\right]_\tau' + + # Positive Feedback + assert latex(MIMOFeedback(tfm_1*tfm_2, tfm_1, 1)) == \ + r'\left(I_{\tau} - \left[\begin{matrix}\frac{1}{s} & \frac{s}{s^{2} - 1}\\\frac{s}{s - 1} & \frac{s^{2}}{s^{2} - 1}\end{matrix}\right]_\tau\cdot\left' \ + r'[\begin{matrix}\frac{s^{2}}{s^{2} - 1} & \frac{s}{s - 1}\\\frac{s}{s^{2} - 1} & \frac{1}{s}\end{matrix}\right]_\tau\cdot\left[\begin{matrix}\frac{1}{s} & \frac{s}{s^{2} - 1}' \ + r'\\\frac{s}{s - 1} & \frac{s^{2}}{s^{2} - 1}\end{matrix}\right]_\tau\right)^{-1} \cdot \left[\begin{matrix}\frac{1}{s} & \frac{s}{s^{2} - 1}' \ + r'\\\frac{s}{s - 1} & \frac{s^{2}}{s^{2} - 1}\end{matrix}\right]_\tau\cdot\left[\begin{matrix}\frac{s^{2}}{s^{2} - 1} & \frac{s}{s - 1}\\\frac{s}{s^{2} - 1}' \ + r' & \frac{1}{s}\end{matrix}\right]_\tau' + + +def test_Quaternion_latex_printing(): + q = Quaternion(x, y, z, t) + assert latex(q) == r"x + y i + z j + t k" + q = Quaternion(x, y, z, x*t) + assert latex(q) == r"x + y i + z j + t x k" + q = Quaternion(x, y, z, x + t) + assert latex(q) == r"x + y i + z j + \left(t + x\right) k" + + +def test_TensorProduct_printing(): + from sympy.tensor.functions import TensorProduct + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + assert latex(TensorProduct(A, B)) == r"A \otimes B" + + +def test_WedgeProduct_printing(): + from sympy.diffgeom.rn import R2 + from sympy.diffgeom import WedgeProduct + wp = WedgeProduct(R2.dx, R2.dy) + assert latex(wp) == r"\operatorname{d}x \wedge \operatorname{d}y" + + +def test_issue_9216(): + expr_1 = Pow(1, -1, evaluate=False) + assert latex(expr_1) == r"1^{-1}" + + expr_2 = Pow(1, Pow(1, -1, evaluate=False), evaluate=False) + assert latex(expr_2) == r"1^{1^{-1}}" + + expr_3 = Pow(3, -2, evaluate=False) + assert latex(expr_3) == r"\frac{1}{9}" + + expr_4 = Pow(1, -2, evaluate=False) + assert latex(expr_4) == r"1^{-2}" + + +def test_latex_printer_tensor(): + from sympy.tensor.tensor import TensorIndexType, tensor_indices, TensorHead, tensor_heads + L = TensorIndexType("L") + i, j, k, l = tensor_indices("i j k l", L) + i0 = tensor_indices("i_0", L) + A, B, C, D = tensor_heads("A B C D", [L]) + H = TensorHead("H", [L, L]) + K = TensorHead("K", [L, L, L, L]) + + assert latex(i) == r"{}^{i}" + assert latex(-i) == r"{}_{i}" + + expr = A(i) + assert latex(expr) == r"A{}^{i}" + + expr = A(i0) + assert latex(expr) == r"A{}^{i_{0}}" + + expr = A(-i) + assert latex(expr) == r"A{}_{i}" + + expr = -3*A(i) + assert latex(expr) == r"-3A{}^{i}" + + expr = K(i, j, -k, -i0) + assert latex(expr) == r"K{}^{ij}{}_{ki_{0}}" + + expr = K(i, -j, -k, i0) + assert latex(expr) == r"K{}^{i}{}_{jk}{}^{i_{0}}" + + expr = K(i, -j, k, -i0) + assert latex(expr) == r"K{}^{i}{}_{j}{}^{k}{}_{i_{0}}" + + expr = H(i, -j) + assert latex(expr) == r"H{}^{i}{}_{j}" + + expr = H(i, j) + assert latex(expr) == r"H{}^{ij}" + + expr = H(-i, -j) + assert latex(expr) == r"H{}_{ij}" + + expr = (1+x)*A(i) + assert latex(expr) == r"\left(x + 1\right)A{}^{i}" + + expr = H(i, -i) + assert latex(expr) == r"H{}^{L_{0}}{}_{L_{0}}" + + expr = H(i, -j)*A(j)*B(k) + assert latex(expr) == r"H{}^{i}{}_{L_{0}}A{}^{L_{0}}B{}^{k}" + + expr = A(i) + 3*B(i) + assert latex(expr) == r"3B{}^{i} + A{}^{i}" + + # Test ``TensorElement``: + from sympy.tensor.tensor import TensorElement + + expr = TensorElement(K(i, j, k, l), {i: 3, k: 2}) + assert latex(expr) == r'K{}^{i=3,j,k=2,l}' + + expr = TensorElement(K(i, j, k, l), {i: 3}) + assert latex(expr) == r'K{}^{i=3,jkl}' + + expr = TensorElement(K(i, -j, k, l), {i: 3, k: 2}) + assert latex(expr) == r'K{}^{i=3}{}_{j}{}^{k=2,l}' + + expr = TensorElement(K(i, -j, k, -l), {i: 3, k: 2}) + assert latex(expr) == r'K{}^{i=3}{}_{j}{}^{k=2}{}_{l}' + + expr = TensorElement(K(i, j, -k, -l), {i: 3, -k: 2}) + assert latex(expr) == r'K{}^{i=3,j}{}_{k=2,l}' + + expr = TensorElement(K(i, j, -k, -l), {i: 3}) + assert latex(expr) == r'K{}^{i=3,j}{}_{kl}' + + expr = PartialDerivative(A(i), A(i)) + assert latex(expr) == r"\frac{\partial}{\partial {A{}^{L_{0}}}}{A{}^{L_{0}}}" + + expr = PartialDerivative(A(-i), A(-j)) + assert latex(expr) == r"\frac{\partial}{\partial {A{}_{j}}}{A{}_{i}}" + + expr = PartialDerivative(K(i, j, -k, -l), A(m), A(-n)) + assert latex(expr) == r"\frac{\partial^{2}}{\partial {A{}^{m}} \partial {A{}_{n}}}{K{}^{ij}{}_{kl}}" + + expr = PartialDerivative(B(-i) + A(-i), A(-j), A(-n)) + assert latex(expr) == r"\frac{\partial^{2}}{\partial {A{}_{j}} \partial {A{}_{n}}}{\left(A{}_{i} + B{}_{i}\right)}" + + expr = PartialDerivative(3*A(-i), A(-j), A(-n)) + assert latex(expr) == r"\frac{\partial^{2}}{\partial {A{}_{j}} \partial {A{}_{n}}}{\left(3A{}_{i}\right)}" + + +def test_multiline_latex(): + a, b, c, d, e, f = symbols('a b c d e f') + expr = -a + 2*b -3*c +4*d -5*e + expected = r"\begin{eqnarray}" + "\n"\ + r"f & = &- a \nonumber\\" + "\n"\ + r"& & + 2 b \nonumber\\" + "\n"\ + r"& & - 3 c \nonumber\\" + "\n"\ + r"& & + 4 d \nonumber\\" + "\n"\ + r"& & - 5 e " + "\n"\ + r"\end{eqnarray}" + assert multiline_latex(f, expr, environment="eqnarray") == expected + + expected2 = r'\begin{eqnarray}' + '\n'\ + r'f & = &- a + 2 b \nonumber\\' + '\n'\ + r'& & - 3 c + 4 d \nonumber\\' + '\n'\ + r'& & - 5 e ' + '\n'\ + r'\end{eqnarray}' + + assert multiline_latex(f, expr, 2, environment="eqnarray") == expected2 + + expected3 = r'\begin{eqnarray}' + '\n'\ + r'f & = &- a + 2 b - 3 c \nonumber\\'+ '\n'\ + r'& & + 4 d - 5 e ' + '\n'\ + r'\end{eqnarray}' + + assert multiline_latex(f, expr, 3, environment="eqnarray") == expected3 + + expected3dots = r'\begin{eqnarray}' + '\n'\ + r'f & = &- a + 2 b - 3 c \dots\nonumber\\'+ '\n'\ + r'& & + 4 d - 5 e ' + '\n'\ + r'\end{eqnarray}' + + assert multiline_latex(f, expr, 3, environment="eqnarray", use_dots=True) == expected3dots + + expected3align = r'\begin{align*}' + '\n'\ + r'f = &- a + 2 b - 3 c \\'+ '\n'\ + r'& + 4 d - 5 e ' + '\n'\ + r'\end{align*}' + + assert multiline_latex(f, expr, 3) == expected3align + assert multiline_latex(f, expr, 3, environment='align*') == expected3align + + expected2ieee = r'\begin{IEEEeqnarray}{rCl}' + '\n'\ + r'f & = &- a + 2 b \nonumber\\' + '\n'\ + r'& & - 3 c + 4 d \nonumber\\' + '\n'\ + r'& & - 5 e ' + '\n'\ + r'\end{IEEEeqnarray}' + + assert multiline_latex(f, expr, 2, environment="IEEEeqnarray") == expected2ieee + + raises(ValueError, lambda: multiline_latex(f, expr, environment="foo")) + +def test_issue_15353(): + a, x = symbols('a x') + # Obtained from nonlinsolve([(sin(a*x)),cos(a*x)],[x,a]) + sol = ConditionSet( + Tuple(x, a), Eq(sin(a*x), 0) & Eq(cos(a*x), 0), S.Complexes**2) + assert latex(sol) == \ + r'\left\{\left( x, \ a\right)\; \middle|\; \left( x, \ a\right) \in ' \ + r'\mathbb{C}^{2} \wedge \sin{\left(a x \right)} = 0 \wedge ' \ + r'\cos{\left(a x \right)} = 0 \right\}' + + +def test_latex_symbolic_probability(): + mu = symbols("mu") + sigma = symbols("sigma", positive=True) + X = Normal("X", mu, sigma) + assert latex(Expectation(X)) == r'\operatorname{E}\left[X\right]' + assert latex(Variance(X)) == r'\operatorname{Var}\left(X\right)' + assert latex(Probability(X > 0)) == r'\operatorname{P}\left(X > 0\right)' + Y = Normal("Y", mu, sigma) + assert latex(Covariance(X, Y)) == r'\operatorname{Cov}\left(X, Y\right)' + + +def test_trace(): + # Issue 15303 + from sympy.matrices.expressions.trace import trace + A = MatrixSymbol("A", 2, 2) + assert latex(trace(A)) == r"\operatorname{tr}\left(A \right)" + assert latex(trace(A**2)) == r"\operatorname{tr}\left(A^{2} \right)" + + +def test_print_basic(): + # Issue 15303 + from sympy.core.basic import Basic + from sympy.core.expr import Expr + + # dummy class for testing printing where the function is not + # implemented in latex.py + class UnimplementedExpr(Expr): + def __new__(cls, e): + return Basic.__new__(cls, e) + + # dummy function for testing + def unimplemented_expr(expr): + return UnimplementedExpr(expr).doit() + + # override class name to use superscript / subscript + def unimplemented_expr_sup_sub(expr): + result = UnimplementedExpr(expr) + result.__class__.__name__ = 'UnimplementedExpr_x^1' + return result + + assert latex(unimplemented_expr(x)) == r'\operatorname{UnimplementedExpr}\left(x\right)' + assert latex(unimplemented_expr(x**2)) == \ + r'\operatorname{UnimplementedExpr}\left(x^{2}\right)' + assert latex(unimplemented_expr_sup_sub(x)) == \ + r'\operatorname{UnimplementedExpr^{1}_{x}}\left(x\right)' + + +def test_MatrixSymbol_bold(): + # Issue #15871 + from sympy.matrices.expressions.trace import trace + A = MatrixSymbol("A", 2, 2) + assert latex(trace(A), mat_symbol_style='bold') == \ + r"\operatorname{tr}\left(\mathbf{A} \right)" + assert latex(trace(A), mat_symbol_style='plain') == \ + r"\operatorname{tr}\left(A \right)" + + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + C = MatrixSymbol("C", 3, 3) + + assert latex(-A, mat_symbol_style='bold') == r"- \mathbf{A}" + assert latex(A - A*B - B, mat_symbol_style='bold') == \ + r"\mathbf{A} - \mathbf{A} \mathbf{B} - \mathbf{B}" + assert latex(-A*B - A*B*C - B, mat_symbol_style='bold') == \ + r"- \mathbf{A} \mathbf{B} - \mathbf{A} \mathbf{B} \mathbf{C} - \mathbf{B}" + + A_k = MatrixSymbol("A_k", 3, 3) + assert latex(A_k, mat_symbol_style='bold') == r"\mathbf{A}_{k}" + + A = MatrixSymbol(r"\nabla_k", 3, 3) + assert latex(A, mat_symbol_style='bold') == r"\mathbf{\nabla}_{k}" + +def test_AppliedPermutation(): + p = Permutation(0, 1, 2) + x = Symbol('x') + assert latex(AppliedPermutation(p, x)) == \ + r'\sigma_{\left( 0\; 1\; 2\right)}(x)' + + +def test_PermutationMatrix(): + p = Permutation(0, 1, 2) + assert latex(PermutationMatrix(p)) == r'P_{\left( 0\; 1\; 2\right)}' + p = Permutation(0, 3)(1, 2) + assert latex(PermutationMatrix(p)) == \ + r'P_{\left( 0\; 3\right)\left( 1\; 2\right)}' + + +def test_issue_21758(): + from sympy.functions.elementary.piecewise import piecewise_fold + from sympy.series.fourier import FourierSeries + x = Symbol('x') + k, n = symbols('k n') + fo = FourierSeries(x, (x, -pi, pi), (0, SeqFormula(0, (k, 1, oo)), SeqFormula( + Piecewise((-2*pi*cos(n*pi)/n + 2*sin(n*pi)/n**2, (n > -oo) & (n < oo) & Ne(n, 0)), + (0, True))*sin(n*x)/pi, (n, 1, oo)))) + assert latex(piecewise_fold(fo)) == '\\begin{cases} 2 \\sin{\\left(x \\right)}' \ + ' - \\sin{\\left(2 x \\right)} + \\frac{2 \\sin{\\left(3 x \\right)}}{3} +' \ + ' \\ldots & \\text{for}\\: n > -\\infty \\wedge n < \\infty \\wedge ' \ + 'n \\neq 0 \\\\0 & \\text{otherwise} \\end{cases}' + assert latex(FourierSeries(x, (x, -pi, pi), (0, SeqFormula(0, (k, 1, oo)), + SeqFormula(0, (n, 1, oo))))) == '0' + + +def test_imaginary_unit(): + assert latex(1 + I) == r'1 + i' + assert latex(1 + I, imaginary_unit='i') == r'1 + i' + assert latex(1 + I, imaginary_unit='j') == r'1 + j' + assert latex(1 + I, imaginary_unit='foo') == r'1 + foo' + assert latex(I, imaginary_unit="ti") == r'\text{i}' + assert latex(I, imaginary_unit="tj") == r'\text{j}' + + +def test_text_re_im(): + assert latex(im(x), gothic_re_im=True) == r'\Im{\left(x\right)}' + assert latex(im(x), gothic_re_im=False) == r'\operatorname{im}{\left(x\right)}' + assert latex(re(x), gothic_re_im=True) == r'\Re{\left(x\right)}' + assert latex(re(x), gothic_re_im=False) == r'\operatorname{re}{\left(x\right)}' + + +def test_latex_diffgeom(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential + from sympy.diffgeom.rn import R2 + x,y = symbols('x y', real=True) + m = Manifold('M', 2) + assert latex(m) == r'\text{M}' + p = Patch('P', m) + assert latex(p) == r'\text{P}_{\text{M}}' + rect = CoordSystem('rect', p, [x, y]) + assert latex(rect) == r'\text{rect}^{\text{P}}_{\text{M}}' + b = BaseScalarField(rect, 0) + assert latex(b) == r'\mathbf{x}' + + g = Function('g') + s_field = g(R2.x, R2.y) + assert latex(Differential(s_field)) == \ + r'\operatorname{d}\left(g{\left(\mathbf{x},\mathbf{y} \right)}\right)' + + +def test_unit_printing(): + assert latex(5*meter) == r'5 \text{m}' + assert latex(3*gibibyte) == r'3 \text{gibibyte}' + assert latex(4*microgram/second) == r'\frac{4 \mu\text{g}}{\text{s}}' + assert latex(4*micro*gram/second) == r'\frac{4 \mu \text{g}}{\text{s}}' + assert latex(5*milli*meter) == r'5 \text{m} \text{m}' + assert latex(milli) == r'\text{m}' + + +def test_issue_17092(): + x_star = Symbol('x^*') + assert latex(Derivative(x_star, x_star,2)) == r'\frac{d^{2}}{d \left(x^{*}\right)^{2}} x^{*}' + + +def test_latex_decimal_separator(): + + x, y, z, t = symbols('x y z t') + k, m, n = symbols('k m n', integer=True) + f, g, h = symbols('f g h', cls=Function) + + # comma decimal_separator + assert(latex([1, 2.3, 4.5], decimal_separator='comma') == r'\left[ 1; \ 2{,}3; \ 4{,}5\right]') + assert(latex(FiniteSet(1, 2.3, 4.5), decimal_separator='comma') == r'\left\{1; 2{,}3; 4{,}5\right\}') + assert(latex((1, 2.3, 4.6), decimal_separator = 'comma') == r'\left( 1; \ 2{,}3; \ 4{,}6\right)') + assert(latex((1,), decimal_separator='comma') == r'\left( 1;\right)') + + # period decimal_separator + assert(latex([1, 2.3, 4.5], decimal_separator='period') == r'\left[ 1, \ 2.3, \ 4.5\right]' ) + assert(latex(FiniteSet(1, 2.3, 4.5), decimal_separator='period') == r'\left\{1, 2.3, 4.5\right\}') + assert(latex((1, 2.3, 4.6), decimal_separator = 'period') == r'\left( 1, \ 2.3, \ 4.6\right)') + assert(latex((1,), decimal_separator='period') == r'\left( 1,\right)') + + # default decimal_separator + assert(latex([1, 2.3, 4.5]) == r'\left[ 1, \ 2.3, \ 4.5\right]') + assert(latex(FiniteSet(1, 2.3, 4.5)) == r'\left\{1, 2.3, 4.5\right\}') + assert(latex((1, 2.3, 4.6)) == r'\left( 1, \ 2.3, \ 4.6\right)') + assert(latex((1,)) == r'\left( 1,\right)') + + assert(latex(Mul(3.4,5.3), decimal_separator = 'comma') == r'18{,}02') + assert(latex(3.4*5.3, decimal_separator = 'comma') == r'18{,}02') + x = symbols('x') + y = symbols('y') + z = symbols('z') + assert(latex(x*5.3 + 2**y**3.4 + 4.5 + z, decimal_separator = 'comma') == r'2^{y^{3{,}4}} + 5{,}3 x + z + 4{,}5') + + assert(latex(0.987, decimal_separator='comma') == r'0{,}987') + assert(latex(S(0.987), decimal_separator='comma') == r'0{,}987') + assert(latex(.3, decimal_separator='comma') == r'0{,}3') + assert(latex(S(.3), decimal_separator='comma') == r'0{,}3') + + + assert(latex(5.8*10**(-7), decimal_separator='comma') == r'5{,}8 \cdot 10^{-7}') + assert(latex(S(5.7)*10**(-7), decimal_separator='comma') == r'5{,}7 \cdot 10^{-7}') + assert(latex(S(5.7*10**(-7)), decimal_separator='comma') == r'5{,}7 \cdot 10^{-7}') + + x = symbols('x') + assert(latex(1.2*x+3.4, decimal_separator='comma') == r'1{,}2 x + 3{,}4') + assert(latex(FiniteSet(1, 2.3, 4.5), decimal_separator='period') == r'\left\{1, 2.3, 4.5\right\}') + + # Error Handling tests + raises(ValueError, lambda: latex([1,2.3,4.5], decimal_separator='non_existing_decimal_separator_in_list')) + raises(ValueError, lambda: latex(FiniteSet(1,2.3,4.5), decimal_separator='non_existing_decimal_separator_in_set')) + raises(ValueError, lambda: latex((1,2.3,4.5), decimal_separator='non_existing_decimal_separator_in_tuple')) + +def test_Str(): + from sympy.core.symbol import Str + assert str(Str('x')) == r'x' + +def test_latex_escape(): + assert latex_escape(r"~^\&%$#_{}") == "".join([ + r'\textasciitilde', + r'\textasciicircum', + r'\textbackslash', + r'\&', + r'\%', + r'\$', + r'\#', + r'\_', + r'\{', + r'\}', + ]) + +def test_emptyPrinter(): + class MyObject: + def __repr__(self): + return "" + + # unknown objects are monospaced + assert latex(MyObject()) == r"\mathtt{\text{}}" + + # even if they are nested within other objects + assert latex((MyObject(),)) == r"\left( \mathtt{\text{}},\right)" + +def test_global_settings(): + import inspect + + # settings should be visible in the signature of `latex` + assert inspect.signature(latex).parameters['imaginary_unit'].default == r'i' + assert latex(I) == r'i' + try: + # but changing the defaults... + LatexPrinter.set_global_settings(imaginary_unit='j') + # ... should change the signature + assert inspect.signature(latex).parameters['imaginary_unit'].default == r'j' + assert latex(I) == r'j' + finally: + # there's no public API to undo this, but we need to make sure we do + # so as not to impact other tests + del LatexPrinter._global_settings['imaginary_unit'] + + # check we really did undo it + assert inspect.signature(latex).parameters['imaginary_unit'].default == r'i' + assert latex(I) == r'i' + +def test_pickleable(): + # this tests that the _PrintFunction instance is pickleable + import pickle + assert pickle.loads(pickle.dumps(latex)) is latex + +def test_printing_latex_array_expressions(): + assert latex(ArraySymbol("A", (2, 3, 4))) == "A" + assert latex(ArrayElement("A", (2, 1/(1-x), 0))) == "{{A}_{2, \\frac{1}{1 - x}, 0}}" + M = MatrixSymbol("M", 3, 3) + N = MatrixSymbol("N", 3, 3) + assert latex(ArrayElement(M*N, [x, 0])) == "{{\\left(M N\\right)}_{x, 0}}" + +def test_Array(): + arr = Array(range(10)) + assert latex(arr) == r'\left[\begin{matrix}0 & 1 & 2 & 3 & 4 & 5 & 6 & 7 & 8 & 9\end{matrix}\right]' + + arr = Array(range(11)) + # fill the empty argument with a bunch of 'c' to avoid latex errors + assert latex(arr) == r'\left[\begin{array}{ccccccccccc}0 & 1 & 2 & 3 & 4 & 5 & 6 & 7 & 8 & 9 & 10\end{array}\right]' + +def test_latex_with_unevaluated(): + with evaluate(False): + assert latex(a * a) == r"a a" + + +def test_latex_disable_split_super_sub(): + assert latex(Symbol('u^a_b')) == 'u^{a}_{b}' + assert latex(Symbol('u^a_b'), disable_split_super_sub=False) == 'u^{a}_{b}' + assert latex(Symbol('u^a_b'), disable_split_super_sub=True) == 'u\\^a\\_b' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_llvmjit.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_llvmjit.py new file mode 100644 index 0000000000000000000000000000000000000000..709476f1d7517dc629210341594a70dc6f41808f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_llvmjit.py @@ -0,0 +1,224 @@ +from sympy.external import import_module +from sympy.testing.pytest import raises +import ctypes + + +if import_module('llvmlite'): + import sympy.printing.llvmjitcode as g +else: + disabled = True + +import sympy +from sympy.abc import a, b, n + + +# copied from numpy.isclose documentation +def isclose(a, b): + rtol = 1e-5 + atol = 1e-8 + return abs(a-b) <= atol + rtol*abs(b) + + +def test_simple_expr(): + e = a + 1.0 + f = g.llvm_callable([a], e) + res = float(e.subs({a: 4.0}).evalf()) + jit_res = f(4.0) + + assert isclose(jit_res, res) + + +def test_two_arg(): + e = 4.0*a + b + 3.0 + f = g.llvm_callable([a, b], e) + res = float(e.subs({a: 4.0, b: 3.0}).evalf()) + jit_res = f(4.0, 3.0) + + assert isclose(jit_res, res) + + +def test_func(): + e = 4.0*sympy.exp(-a) + f = g.llvm_callable([a], e) + res = float(e.subs({a: 1.5}).evalf()) + jit_res = f(1.5) + + assert isclose(jit_res, res) + + +def test_two_func(): + e = 4.0*sympy.exp(-a) + sympy.exp(b) + f = g.llvm_callable([a, b], e) + res = float(e.subs({a: 1.5, b: 2.0}).evalf()) + jit_res = f(1.5, 2.0) + + assert isclose(jit_res, res) + + +def test_two_sqrt(): + e = 4.0*sympy.sqrt(a) + sympy.sqrt(b) + f = g.llvm_callable([a, b], e) + res = float(e.subs({a: 1.5, b: 2.0}).evalf()) + jit_res = f(1.5, 2.0) + + assert isclose(jit_res, res) + + +def test_two_pow(): + e = a**1.5 + b**7 + f = g.llvm_callable([a, b], e) + res = float(e.subs({a: 1.5, b: 2.0}).evalf()) + jit_res = f(1.5, 2.0) + + assert isclose(jit_res, res) + + +def test_callback(): + e = a + 1.2 + f = g.llvm_callable([a], e, callback_type='scipy.integrate.test') + m = ctypes.c_int(1) + array_type = ctypes.c_double * 1 + inp = {a: 2.2} + array = array_type(inp[a]) + jit_res = f(m, array) + + res = float(e.subs(inp).evalf()) + + assert isclose(jit_res, res) + + +def test_callback_cubature(): + e = a + 1.2 + f = g.llvm_callable([a], e, callback_type='cubature') + m = ctypes.c_int(1) + array_type = ctypes.c_double * 1 + inp = {a: 2.2} + array = array_type(inp[a]) + out_array = array_type(0.0) + jit_ret = f(m, array, None, m, out_array) + + assert jit_ret == 0 + + res = float(e.subs(inp).evalf()) + + assert isclose(out_array[0], res) + + +def test_callback_two(): + e = 3*a*b + f = g.llvm_callable([a, b], e, callback_type='scipy.integrate.test') + m = ctypes.c_int(2) + array_type = ctypes.c_double * 2 + inp = {a: 0.2, b: 1.7} + array = array_type(inp[a], inp[b]) + jit_res = f(m, array) + + res = float(e.subs(inp).evalf()) + + assert isclose(jit_res, res) + + +def test_callback_alt_two(): + d = sympy.IndexedBase('d') + e = 3*d[0]*d[1] + f = g.llvm_callable([n, d], e, callback_type='scipy.integrate.test') + m = ctypes.c_int(2) + array_type = ctypes.c_double * 2 + inp = {d[0]: 0.2, d[1]: 1.7} + array = array_type(inp[d[0]], inp[d[1]]) + jit_res = f(m, array) + + res = float(e.subs(inp).evalf()) + + assert isclose(jit_res, res) + + +def test_multiple_statements(): + # Match return from CSE + e = [[(b, 4.0*a)], [b + 5]] + f = g.llvm_callable([a], e) + b_val = e[0][0][1].subs({a: 1.5}) + res = float(e[1][0].subs({b: b_val}).evalf()) + jit_res = f(1.5) + assert isclose(jit_res, res) + + f_callback = g.llvm_callable([a], e, callback_type='scipy.integrate.test') + m = ctypes.c_int(1) + array_type = ctypes.c_double * 1 + array = array_type(1.5) + jit_callback_res = f_callback(m, array) + assert isclose(jit_callback_res, res) + + +def test_cse(): + e = a*a + b*b + sympy.exp(-a*a - b*b) + e2 = sympy.cse(e) + f = g.llvm_callable([a, b], e2) + res = float(e.subs({a: 2.3, b: 0.1}).evalf()) + jit_res = f(2.3, 0.1) + + assert isclose(jit_res, res) + + +def eval_cse(e, sub_dict): + tmp_dict = {} + for tmp_name, tmp_expr in e[0]: + e2 = tmp_expr.subs(sub_dict) + e3 = e2.subs(tmp_dict) + tmp_dict[tmp_name] = e3 + return [e.subs(sub_dict).subs(tmp_dict) for e in e[1]] + + +def test_cse_multiple(): + e1 = a*a + e2 = a*a + b*b + e3 = sympy.cse([e1, e2]) + + raises(NotImplementedError, + lambda: g.llvm_callable([a, b], e3, callback_type='scipy.integrate')) + + f = g.llvm_callable([a, b], e3) + jit_res = f(0.1, 1.5) + assert len(jit_res) == 2 + res = eval_cse(e3, {a: 0.1, b: 1.5}) + assert isclose(res[0], jit_res[0]) + assert isclose(res[1], jit_res[1]) + + +def test_callback_cubature_multiple(): + e1 = a*a + e2 = a*a + b*b + e3 = sympy.cse([e1, e2, 4*e2]) + f = g.llvm_callable([a, b], e3, callback_type='cubature') + + # Number of input variables + ndim = 2 + # Number of output expression values + outdim = 3 + + m = ctypes.c_int(ndim) + fdim = ctypes.c_int(outdim) + array_type = ctypes.c_double * ndim + out_array_type = ctypes.c_double * outdim + inp = {a: 0.2, b: 1.5} + array = array_type(inp[a], inp[b]) + out_array = out_array_type() + jit_ret = f(m, array, None, fdim, out_array) + + assert jit_ret == 0 + + res = eval_cse(e3, inp) + + assert isclose(out_array[0], res[0]) + assert isclose(out_array[1], res[1]) + assert isclose(out_array[2], res[2]) + + +def test_symbol_not_found(): + e = a*a + b + raises(LookupError, lambda: g.llvm_callable([a], e)) + + +def test_bad_callback(): + e = a + raises(ValueError, lambda: g.llvm_callable([a], e, callback_type='bad_callback')) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_maple.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_maple.py new file mode 100644 index 0000000000000000000000000000000000000000..9bb4c512ad3203bd64ae56b350e15734b3a6afb0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_maple.py @@ -0,0 +1,381 @@ +from sympy.core import (S, pi, oo, symbols, Function, Rational, Integer, + Tuple, Symbol, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.core import EulerGamma, GoldenRatio, Catalan, Lambda, Mul, Pow +from sympy.functions import Piecewise, sqrt, ceiling, exp, sin, cos, sinc, lucas +from sympy.testing.pytest import raises +from sympy.utilities.lambdify import implemented_function +from sympy.matrices import (eye, Matrix, MatrixSymbol, Identity, + HadamardProduct, SparseMatrix) +from sympy.functions.special.bessel import besseli + +from sympy.printing.maple import maple_code + +x, y, z = symbols('x,y,z') + + +def test_Integer(): + assert maple_code(Integer(67)) == "67" + assert maple_code(Integer(-1)) == "-1" + + +def test_Rational(): + assert maple_code(Rational(3, 7)) == "3/7" + assert maple_code(Rational(18, 9)) == "2" + assert maple_code(Rational(3, -7)) == "-3/7" + assert maple_code(Rational(-3, -7)) == "3/7" + assert maple_code(x + Rational(3, 7)) == "x + 3/7" + assert maple_code(Rational(3, 7) * x) == '(3/7)*x' + + +def test_Relational(): + assert maple_code(Eq(x, y)) == "x = y" + assert maple_code(Ne(x, y)) == "x <> y" + assert maple_code(Le(x, y)) == "x <= y" + assert maple_code(Lt(x, y)) == "x < y" + assert maple_code(Gt(x, y)) == "x > y" + assert maple_code(Ge(x, y)) == "x >= y" + + +def test_Function(): + assert maple_code(sin(x) ** cos(x)) == "sin(x)^cos(x)" + assert maple_code(abs(x)) == "abs(x)" + assert maple_code(ceiling(x)) == "ceil(x)" + + +def test_Pow(): + assert maple_code(x ** 3) == "x^3" + assert maple_code(x ** (y ** 3)) == "x^(y^3)" + + assert maple_code((x ** 3) ** y) == "(x^3)^y" + assert maple_code(x ** Rational(2, 3)) == 'x^(2/3)' + + g = implemented_function('g', Lambda(x, 2 * x)) + assert maple_code(1 / (g(x) * 3.5) ** (x - y ** x) / (x ** 2 + y)) == \ + "(3.5*2*x)^(-x + y^x)/(x^2 + y)" + # For issue 14160 + assert maple_code(Mul(-2, x, Pow(Mul(y, y, evaluate=False), -1, evaluate=False), + evaluate=False)) == '-2*x/(y*y)' + + +def test_basic_ops(): + assert maple_code(x * y) == "x*y" + assert maple_code(x + y) == "x + y" + assert maple_code(x - y) == "x - y" + assert maple_code(-x) == "-x" + + +def test_1_over_x_and_sqrt(): + # 1.0 and 0.5 would do something different in regular StrPrinter, + # but these are exact in IEEE floating point so no different here. + assert maple_code(1 / x) == '1/x' + assert maple_code(x ** -1) == maple_code(x ** -1.0) == '1/x' + assert maple_code(1 / sqrt(x)) == '1/sqrt(x)' + assert maple_code(x ** -S.Half) == maple_code(x ** -0.5) == '1/sqrt(x)' + assert maple_code(sqrt(x)) == 'sqrt(x)' + assert maple_code(x ** S.Half) == maple_code(x ** 0.5) == 'sqrt(x)' + assert maple_code(1 / pi) == '1/Pi' + assert maple_code(pi ** -1) == maple_code(pi ** -1.0) == '1/Pi' + assert maple_code(pi ** -0.5) == '1/sqrt(Pi)' + + +def test_mix_number_mult_symbols(): + assert maple_code(3 * x) == "3*x" + assert maple_code(pi * x) == "Pi*x" + assert maple_code(3 / x) == "3/x" + assert maple_code(pi / x) == "Pi/x" + assert maple_code(x / 3) == '(1/3)*x' + assert maple_code(x / pi) == "x/Pi" + assert maple_code(x * y) == "x*y" + assert maple_code(3 * x * y) == "3*x*y" + assert maple_code(3 * pi * x * y) == "3*Pi*x*y" + assert maple_code(x / y) == "x/y" + assert maple_code(3 * x / y) == "3*x/y" + assert maple_code(x * y / z) == "x*y/z" + assert maple_code(x / y * z) == "x*z/y" + assert maple_code(1 / x / y) == "1/(x*y)" + assert maple_code(2 * pi * x / y / z) == "2*Pi*x/(y*z)" + assert maple_code(3 * pi / x) == "3*Pi/x" + assert maple_code(S(3) / 5) == "3/5" + assert maple_code(S(3) / 5 * x) == '(3/5)*x' + assert maple_code(x / y / z) == "x/(y*z)" + assert maple_code((x + y) / z) == "(x + y)/z" + assert maple_code((x + y) / (z + x)) == "(x + y)/(x + z)" + assert maple_code((x + y) / EulerGamma) == '(x + y)/gamma' + assert maple_code(x / 3 / pi) == '(1/3)*x/Pi' + assert maple_code(S(3) / 5 * x * y / pi) == '(3/5)*x*y/Pi' + + +def test_mix_number_pow_symbols(): + assert maple_code(pi ** 3) == 'Pi^3' + assert maple_code(x ** 2) == 'x^2' + + assert maple_code(x ** (pi ** 3)) == 'x^(Pi^3)' + assert maple_code(x ** y) == 'x^y' + + assert maple_code(x ** (y ** z)) == 'x^(y^z)' + assert maple_code((x ** y) ** z) == '(x^y)^z' + + +def test_imag(): + I = S('I') + assert maple_code(I) == "I" + assert maple_code(5 * I) == "5*I" + + assert maple_code((S(3) / 2) * I) == "(3/2)*I" + assert maple_code(3 + 4 * I) == "3 + 4*I" + + +def test_constants(): + assert maple_code(pi) == "Pi" + assert maple_code(oo) == "infinity" + assert maple_code(-oo) == "-infinity" + assert maple_code(S.NegativeInfinity) == "-infinity" + assert maple_code(S.NaN) == "undefined" + assert maple_code(S.Exp1) == "exp(1)" + assert maple_code(exp(1)) == "exp(1)" + + +def test_constants_other(): + assert maple_code(2 * GoldenRatio) == '2*(1/2 + (1/2)*sqrt(5))' + assert maple_code(2 * Catalan) == '2*Catalan' + assert maple_code(2 * EulerGamma) == "2*gamma" + + +def test_boolean(): + assert maple_code(x & y) == "x and y" + assert maple_code(x | y) == "x or y" + assert maple_code(~x) == "not x" + assert maple_code(x & y & z) == "x and y and z" + assert maple_code(x | y | z) == "x or y or z" + assert maple_code((x & y) | z) == "z or x and y" + assert maple_code((x | y) & z) == "z and (x or y)" + + +def test_Matrices(): + assert maple_code(Matrix(1, 1, [10])) == \ + 'Matrix([[10]], storage = rectangular)' + + A = Matrix([[1, sin(x / 2), abs(x)], + [0, 1, pi], + [0, exp(1), ceiling(x)]]) + expected = \ + 'Matrix(' \ + '[[1, sin((1/2)*x), abs(x)],' \ + ' [0, 1, Pi],' \ + ' [0, exp(1), ceil(x)]], ' \ + 'storage = rectangular)' + assert maple_code(A) == expected + + # row and columns + assert maple_code(A[:, 0]) == \ + 'Matrix([[1], [0], [0]], storage = rectangular)' + assert maple_code(A[0, :]) == \ + 'Matrix([[1, sin((1/2)*x), abs(x)]], storage = rectangular)' + assert maple_code(Matrix([[x, x - y, -y]])) == \ + 'Matrix([[x, x - y, -y]], storage = rectangular)' + + # empty matrices + assert maple_code(Matrix(0, 0, [])) == \ + 'Matrix([], storage = rectangular)' + assert maple_code(Matrix(0, 3, [])) == \ + 'Matrix([], storage = rectangular)' + +def test_SparseMatrices(): + assert maple_code(SparseMatrix(Identity(2))) == 'Matrix([[1, 0], [0, 1]], storage = sparse)' + + +def test_vector_entries_hadamard(): + # For a row or column, user might to use the other dimension + A = Matrix([[1, sin(2 / x), 3 * pi / x / 5]]) + assert maple_code(A) == \ + 'Matrix([[1, sin(2/x), (3/5)*Pi/x]], storage = rectangular)' + assert maple_code(A.T) == \ + 'Matrix([[1], [sin(2/x)], [(3/5)*Pi/x]], storage = rectangular)' + + +def test_Matrices_entries_not_hadamard(): + A = Matrix([[1, sin(2 / x), 3 * pi / x / 5], [1, 2, x * y]]) + expected = \ + 'Matrix([[1, sin(2/x), (3/5)*Pi/x], [1, 2, x*y]], ' \ + 'storage = rectangular)' + assert maple_code(A) == expected + + +def test_MatrixSymbol(): + n = Symbol('n', integer=True) + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, n) + assert maple_code(A * B) == "A.B" + assert maple_code(B * A) == "B.A" + assert maple_code(2 * A * B) == "2*A.B" + assert maple_code(B * 2 * A) == "2*B.A" + + assert maple_code( + A * (B + 3 * Identity(n))) == "A.(3*Matrix(n, shape = identity) + B)" + + assert maple_code(A ** (x ** 2)) == "MatrixPower(A, x^2)" + assert maple_code(A ** 3) == "MatrixPower(A, 3)" + assert maple_code(A ** (S.Half)) == "MatrixPower(A, 1/2)" + + +def test_special_matrices(): + assert maple_code(6 * Identity(3)) == "6*Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]], storage = sparse)" + assert maple_code(Identity(x)) == 'Matrix(x, shape = identity)' + + +def test_containers(): + assert maple_code([1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]) == \ + "[1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]" + + assert maple_code((1, 2, (3, 4))) == "[1, 2, [3, 4]]" + assert maple_code([1]) == "[1]" + assert maple_code((1,)) == "[1]" + assert maple_code(Tuple(*[1, 2, 3])) == "[1, 2, 3]" + assert maple_code((1, x * y, (3, x ** 2))) == "[1, x*y, [3, x^2]]" + # scalar, matrix, empty matrix and empty list + + assert maple_code((1, eye(3), Matrix(0, 0, []), [])) == \ + "[1, Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]], storage = rectangular), Matrix([], storage = rectangular), []]" + + +def test_maple_noninline(): + source = maple_code((x + y)/Catalan, assign_to='me', inline=False) + expected = "me := (x + y)/Catalan" + + assert source == expected + + +def test_maple_matrix_assign_to(): + A = Matrix([[1, 2, 3]]) + assert maple_code(A, assign_to='a') == "a := Matrix([[1, 2, 3]], storage = rectangular)" + A = Matrix([[1, 2], [3, 4]]) + assert maple_code(A, assign_to='A') == "A := Matrix([[1, 2], [3, 4]], storage = rectangular)" + + +def test_maple_matrix_assign_to_more(): + # assigning to Symbol or MatrixSymbol requires lhs/rhs match + A = Matrix([[1, 2, 3]]) + B = MatrixSymbol('B', 1, 3) + C = MatrixSymbol('C', 2, 3) + assert maple_code(A, assign_to=B) == "B := Matrix([[1, 2, 3]], storage = rectangular)" + raises(ValueError, lambda: maple_code(A, assign_to=x)) + raises(ValueError, lambda: maple_code(A, assign_to=C)) + + +def test_maple_matrix_1x1(): + A = Matrix([[3]]) + assert maple_code(A, assign_to='B') == "B := Matrix([[3]], storage = rectangular)" + + +def test_maple_matrix_elements(): + A = Matrix([[x, 2, x * y]]) + + assert maple_code(A[0, 0] ** 2 + A[0, 1] + A[0, 2]) == "x^2 + x*y + 2" + AA = MatrixSymbol('AA', 1, 3) + assert maple_code(AA) == "AA" + + assert maple_code(AA[0, 0] ** 2 + sin(AA[0, 1]) + AA[0, 2]) == \ + "sin(AA[1, 2]) + AA[1, 1]^2 + AA[1, 3]" + assert maple_code(sum(AA)) == "AA[1, 1] + AA[1, 2] + AA[1, 3]" + + +def test_maple_boolean(): + assert maple_code(True) == "true" + assert maple_code(S.true) == "true" + assert maple_code(False) == "false" + assert maple_code(S.false) == "false" + + +def test_sparse(): + M = SparseMatrix(5, 6, {}) + M[2, 2] = 10 + M[1, 2] = 20 + M[1, 3] = 22 + M[0, 3] = 30 + M[3, 0] = x * y + assert maple_code(M) == \ + 'Matrix([[0, 0, 0, 30, 0, 0],' \ + ' [0, 0, 20, 22, 0, 0],' \ + ' [0, 0, 10, 0, 0, 0],' \ + ' [x*y, 0, 0, 0, 0, 0],' \ + ' [0, 0, 0, 0, 0, 0]], ' \ + 'storage = sparse)' + +# Not an important point. +def test_maple_not_supported(): + with raises(NotImplementedError): + maple_code(S.ComplexInfinity) + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + + assert (maple_code(A[0, 0]) == "A[1, 1]") + assert (maple_code(3 * A[0, 0]) == "3*A[1, 1]") + + F = A-B + + assert (maple_code(F[0,0]) == "A[1, 1] - B[1, 1]") + + +def test_hadamard(): + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + v = MatrixSymbol('v', 3, 1) + h = MatrixSymbol('h', 1, 3) + C = HadamardProduct(A, B) + assert maple_code(C) == "A*B" + + assert maple_code(C * v) == "(A*B).v" + # HadamardProduct is higher than dot product. + + assert maple_code(h * C * v) == "h.(A*B).v" + + assert maple_code(C * A) == "(A*B).A" + # mixing Hadamard and scalar strange b/c we vectorize scalars + + assert maple_code(C * x * y) == "x*y*(A*B)" + + +def test_maple_piecewise(): + expr = Piecewise((x, x < 1), (x ** 2, True)) + + assert maple_code(expr) == "piecewise(x < 1, x, x^2)" + assert maple_code(expr, assign_to="r") == ( + "r := piecewise(x < 1, x, x^2)") + + expr = Piecewise((x ** 2, x < 1), (x ** 3, x < 2), (x ** 4, x < 3), (x ** 5, True)) + expected = "piecewise(x < 1, x^2, x < 2, x^3, x < 3, x^4, x^5)" + assert maple_code(expr) == expected + assert maple_code(expr, assign_to="r") == "r := " + expected + + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x ** 2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: maple_code(expr)) + + +def test_maple_piecewise_times_const(): + pw = Piecewise((x, x < 1), (x ** 2, True)) + + assert maple_code(2 * pw) == "2*piecewise(x < 1, x, x^2)" + assert maple_code(pw / x) == "piecewise(x < 1, x, x^2)/x" + assert maple_code(pw / (x * y)) == "piecewise(x < 1, x, x^2)/(x*y)" + assert maple_code(pw / 3) == "(1/3)*piecewise(x < 1, x, x^2)" + + +def test_maple_derivatives(): + f = Function('f') + assert maple_code(f(x).diff(x)) == 'diff(f(x), x)' + assert maple_code(f(x).diff(x, 2)) == 'diff(f(x), x$2)' + + +def test_automatic_rewrites(): + assert maple_code(lucas(x)) == '(2^(-x)*((1 - sqrt(5))^x + (1 + sqrt(5))^x))' + assert maple_code(sinc(x)) == '(piecewise(x <> 0, sin(x)/x, 1))' + + +def test_specfun(): + assert maple_code('asin(x)') == 'arcsin(x)' + assert maple_code(besseli(x, y)) == 'BesselI(x, y)' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathematica.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathematica.py new file mode 100644 index 0000000000000000000000000000000000000000..aaf6b537677442ae59a4f1bbd2b5774d6646f4e2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathematica.py @@ -0,0 +1,287 @@ +from sympy.core import (S, pi, oo, symbols, Function, Rational, Integer, Tuple, + Derivative, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.integrals import Integral +from sympy.concrete import Sum +from sympy.functions import (exp, sin, cos, fresnelc, fresnels, conjugate, Max, + Min, gamma, polygamma, loggamma, erf, erfi, erfc, + erf2, expint, erfinv, erfcinv, Ei, Si, Ci, li, + Shi, Chi, uppergamma, beta, subfactorial, erf2inv, + factorial, factorial2, catalan, RisingFactorial, + FallingFactorial, harmonic, atan2, sec, acsc, + hermite, laguerre, assoc_laguerre, jacobi, + gegenbauer, chebyshevt, chebyshevu, legendre, + assoc_legendre, Li, LambertW) + +from sympy.printing.mathematica import mathematica_code as mcode + +x, y, z, w = symbols('x,y,z,w') +f = Function('f') + + +def test_Integer(): + assert mcode(Integer(67)) == "67" + assert mcode(Integer(-1)) == "-1" + + +def test_Rational(): + assert mcode(Rational(3, 7)) == "3/7" + assert mcode(Rational(18, 9)) == "2" + assert mcode(Rational(3, -7)) == "-3/7" + assert mcode(Rational(-3, -7)) == "3/7" + assert mcode(x + Rational(3, 7)) == "x + 3/7" + assert mcode(Rational(3, 7)*x) == "(3/7)*x" + + +def test_Relational(): + assert mcode(Eq(x, y)) == "x == y" + assert mcode(Ne(x, y)) == "x != y" + assert mcode(Le(x, y)) == "x <= y" + assert mcode(Lt(x, y)) == "x < y" + assert mcode(Gt(x, y)) == "x > y" + assert mcode(Ge(x, y)) == "x >= y" + + +def test_Function(): + assert mcode(f(x, y, z)) == "f[x, y, z]" + assert mcode(sin(x) ** cos(x)) == "Sin[x]^Cos[x]" + assert mcode(sec(x) * acsc(x)) == "ArcCsc[x]*Sec[x]" + assert mcode(atan2(y, x)) == "ArcTan[x, y]" + assert mcode(conjugate(x)) == "Conjugate[x]" + assert mcode(Max(x, y, z)*Min(y, z)) == "Max[x, y, z]*Min[y, z]" + assert mcode(fresnelc(x)) == "FresnelC[x]" + assert mcode(fresnels(x)) == "FresnelS[x]" + assert mcode(gamma(x)) == "Gamma[x]" + assert mcode(uppergamma(x, y)) == "Gamma[x, y]" + assert mcode(polygamma(x, y)) == "PolyGamma[x, y]" + assert mcode(loggamma(x)) == "LogGamma[x]" + assert mcode(erf(x)) == "Erf[x]" + assert mcode(erfc(x)) == "Erfc[x]" + assert mcode(erfi(x)) == "Erfi[x]" + assert mcode(erf2(x, y)) == "Erf[x, y]" + assert mcode(expint(x, y)) == "ExpIntegralE[x, y]" + assert mcode(erfcinv(x)) == "InverseErfc[x]" + assert mcode(erfinv(x)) == "InverseErf[x]" + assert mcode(erf2inv(x, y)) == "InverseErf[x, y]" + assert mcode(Ei(x)) == "ExpIntegralEi[x]" + assert mcode(Ci(x)) == "CosIntegral[x]" + assert mcode(li(x)) == "LogIntegral[x]" + assert mcode(Si(x)) == "SinIntegral[x]" + assert mcode(Shi(x)) == "SinhIntegral[x]" + assert mcode(Chi(x)) == "CoshIntegral[x]" + assert mcode(beta(x, y)) == "Beta[x, y]" + assert mcode(factorial(x)) == "Factorial[x]" + assert mcode(factorial2(x)) == "Factorial2[x]" + assert mcode(subfactorial(x)) == "Subfactorial[x]" + assert mcode(FallingFactorial(x, y)) == "FactorialPower[x, y]" + assert mcode(RisingFactorial(x, y)) == "Pochhammer[x, y]" + assert mcode(catalan(x)) == "CatalanNumber[x]" + assert mcode(harmonic(x)) == "HarmonicNumber[x]" + assert mcode(harmonic(x, y)) == "HarmonicNumber[x, y]" + assert mcode(Li(x)) == "LogIntegral[x] - LogIntegral[2]" + assert mcode(LambertW(x)) == "ProductLog[x]" + assert mcode(LambertW(x, -1)) == "ProductLog[-1, x]" + assert mcode(LambertW(x, y)) == "ProductLog[y, x]" + + +def test_special_polynomials(): + assert mcode(hermite(x, y)) == "HermiteH[x, y]" + assert mcode(laguerre(x, y)) == "LaguerreL[x, y]" + assert mcode(assoc_laguerre(x, y, z)) == "LaguerreL[x, y, z]" + assert mcode(jacobi(x, y, z, w)) == "JacobiP[x, y, z, w]" + assert mcode(gegenbauer(x, y, z)) == "GegenbauerC[x, y, z]" + assert mcode(chebyshevt(x, y)) == "ChebyshevT[x, y]" + assert mcode(chebyshevu(x, y)) == "ChebyshevU[x, y]" + assert mcode(legendre(x, y)) == "LegendreP[x, y]" + assert mcode(assoc_legendre(x, y, z)) == "LegendreP[x, y, z]" + + +def test_Pow(): + assert mcode(x**3) == "x^3" + assert mcode(x**(y**3)) == "x^(y^3)" + assert mcode(1/(f(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "(3.5*f[x])^(-x + y^x)/(x^2 + y)" + assert mcode(x**-1.0) == 'x^(-1.0)' + assert mcode(x**Rational(2, 3)) == 'x^(2/3)' + + +def test_Mul(): + A, B, C, D = symbols('A B C D', commutative=False) + assert mcode(x*y*z) == "x*y*z" + assert mcode(x*y*A) == "x*y*A" + assert mcode(x*y*A*B) == "x*y*A**B" + assert mcode(x*y*A*B*C) == "x*y*A**B**C" + assert mcode(x*A*B*(C + D)*A*y) == "x*y*A**B**(C + D)**A" + + +def test_constants(): + assert mcode(S.Zero) == "0" + assert mcode(S.One) == "1" + assert mcode(S.NegativeOne) == "-1" + assert mcode(S.Half) == "1/2" + assert mcode(S.ImaginaryUnit) == "I" + + assert mcode(oo) == "Infinity" + assert mcode(S.NegativeInfinity) == "-Infinity" + assert mcode(S.ComplexInfinity) == "ComplexInfinity" + assert mcode(S.NaN) == "Indeterminate" + + assert mcode(S.Exp1) == "E" + assert mcode(pi) == "Pi" + assert mcode(S.GoldenRatio) == "GoldenRatio" + assert mcode(S.TribonacciConstant) == \ + "(1/3 + (1/3)*(19 - 3*33^(1/2))^(1/3) + " \ + "(1/3)*(3*33^(1/2) + 19)^(1/3))" + assert mcode(2*S.TribonacciConstant) == \ + "2*(1/3 + (1/3)*(19 - 3*33^(1/2))^(1/3) + " \ + "(1/3)*(3*33^(1/2) + 19)^(1/3))" + assert mcode(S.EulerGamma) == "EulerGamma" + assert mcode(S.Catalan) == "Catalan" + + +def test_containers(): + assert mcode([1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]) == \ + "{1, 2, 3, {4, 5, {6, 7}}, 8, {9, 10}, 11}" + assert mcode((1, 2, (3, 4))) == "{1, 2, {3, 4}}" + assert mcode([1]) == "{1}" + assert mcode((1,)) == "{1}" + assert mcode(Tuple(*[1, 2, 3])) == "{1, 2, 3}" + + +def test_matrices(): + from sympy.matrices import MutableDenseMatrix, MutableSparseMatrix, \ + ImmutableDenseMatrix, ImmutableSparseMatrix + A = MutableDenseMatrix( + [[1, -1, 0, 0], + [0, 1, -1, 0], + [0, 0, 1, -1], + [0, 0, 0, 1]] + ) + B = MutableSparseMatrix(A) + C = ImmutableDenseMatrix(A) + D = ImmutableSparseMatrix(A) + + assert mcode(C) == mcode(A) == \ + "{{1, -1, 0, 0}, " \ + "{0, 1, -1, 0}, " \ + "{0, 0, 1, -1}, " \ + "{0, 0, 0, 1}}" + + assert mcode(D) == mcode(B) == \ + "SparseArray[{" \ + "{1, 1} -> 1, {1, 2} -> -1, {2, 2} -> 1, {2, 3} -> -1, " \ + "{3, 3} -> 1, {3, 4} -> -1, {4, 4} -> 1" \ + "}, {4, 4}]" + + # Trivial cases of matrices + assert mcode(MutableDenseMatrix(0, 0, [])) == '{}' + assert mcode(MutableSparseMatrix(0, 0, [])) == 'SparseArray[{}, {0, 0}]' + assert mcode(MutableDenseMatrix(0, 3, [])) == '{}' + assert mcode(MutableSparseMatrix(0, 3, [])) == 'SparseArray[{}, {0, 3}]' + assert mcode(MutableDenseMatrix(3, 0, [])) == '{{}, {}, {}}' + assert mcode(MutableSparseMatrix(3, 0, [])) == 'SparseArray[{}, {3, 0}]' + +def test_NDArray(): + from sympy.tensor.array import ( + MutableDenseNDimArray, ImmutableDenseNDimArray, + MutableSparseNDimArray, ImmutableSparseNDimArray) + + example = MutableDenseNDimArray( + [[[1, 2, 3, 4], + [5, 6, 7, 8], + [9, 10, 11, 12]], + [[13, 14, 15, 16], + [17, 18, 19, 20], + [21, 22, 23, 24]]] + ) + + assert mcode(example) == \ + "{{{1, 2, 3, 4}, {5, 6, 7, 8}, {9, 10, 11, 12}}, " \ + "{{13, 14, 15, 16}, {17, 18, 19, 20}, {21, 22, 23, 24}}}" + + example = ImmutableDenseNDimArray(example) + + assert mcode(example) == \ + "{{{1, 2, 3, 4}, {5, 6, 7, 8}, {9, 10, 11, 12}}, " \ + "{{13, 14, 15, 16}, {17, 18, 19, 20}, {21, 22, 23, 24}}}" + + example = MutableSparseNDimArray(example) + + assert mcode(example) == \ + "SparseArray[{" \ + "{1, 1, 1} -> 1, {1, 1, 2} -> 2, {1, 1, 3} -> 3, " \ + "{1, 1, 4} -> 4, {1, 2, 1} -> 5, {1, 2, 2} -> 6, " \ + "{1, 2, 3} -> 7, {1, 2, 4} -> 8, {1, 3, 1} -> 9, " \ + "{1, 3, 2} -> 10, {1, 3, 3} -> 11, {1, 3, 4} -> 12, " \ + "{2, 1, 1} -> 13, {2, 1, 2} -> 14, {2, 1, 3} -> 15, " \ + "{2, 1, 4} -> 16, {2, 2, 1} -> 17, {2, 2, 2} -> 18, " \ + "{2, 2, 3} -> 19, {2, 2, 4} -> 20, {2, 3, 1} -> 21, " \ + "{2, 3, 2} -> 22, {2, 3, 3} -> 23, {2, 3, 4} -> 24" \ + "}, {2, 3, 4}]" + + example = ImmutableSparseNDimArray(example) + + assert mcode(example) == \ + "SparseArray[{" \ + "{1, 1, 1} -> 1, {1, 1, 2} -> 2, {1, 1, 3} -> 3, " \ + "{1, 1, 4} -> 4, {1, 2, 1} -> 5, {1, 2, 2} -> 6, " \ + "{1, 2, 3} -> 7, {1, 2, 4} -> 8, {1, 3, 1} -> 9, " \ + "{1, 3, 2} -> 10, {1, 3, 3} -> 11, {1, 3, 4} -> 12, " \ + "{2, 1, 1} -> 13, {2, 1, 2} -> 14, {2, 1, 3} -> 15, " \ + "{2, 1, 4} -> 16, {2, 2, 1} -> 17, {2, 2, 2} -> 18, " \ + "{2, 2, 3} -> 19, {2, 2, 4} -> 20, {2, 3, 1} -> 21, " \ + "{2, 3, 2} -> 22, {2, 3, 3} -> 23, {2, 3, 4} -> 24" \ + "}, {2, 3, 4}]" + + +def test_Integral(): + assert mcode(Integral(sin(sin(x)), x)) == "Hold[Integrate[Sin[Sin[x]], x]]" + assert mcode(Integral(exp(-x**2 - y**2), + (x, -oo, oo), + (y, -oo, oo))) == \ + "Hold[Integrate[Exp[-x^2 - y^2], {x, -Infinity, Infinity}, " \ + "{y, -Infinity, Infinity}]]" + + +def test_Derivative(): + assert mcode(Derivative(sin(x), x)) == "Hold[D[Sin[x], x]]" + assert mcode(Derivative(x, x)) == "Hold[D[x, x]]" + assert mcode(Derivative(sin(x)*y**4, x, 2)) == "Hold[D[y^4*Sin[x], {x, 2}]]" + assert mcode(Derivative(sin(x)*y**4, x, y, x)) == "Hold[D[y^4*Sin[x], x, y, x]]" + assert mcode(Derivative(sin(x)*y**4, x, y, 3, x)) == "Hold[D[y^4*Sin[x], x, {y, 3}, x]]" + + +def test_Sum(): + assert mcode(Sum(sin(x), (x, 0, 10))) == "Hold[Sum[Sin[x], {x, 0, 10}]]" + assert mcode(Sum(exp(-x**2 - y**2), + (x, -oo, oo), + (y, -oo, oo))) == \ + "Hold[Sum[Exp[-x^2 - y^2], {x, -Infinity, Infinity}, " \ + "{y, -Infinity, Infinity}]]" + + +def test_comment(): + from sympy.printing.mathematica import MCodePrinter + assert MCodePrinter()._get_comment("Hello World") == \ + "(* Hello World *)" + + +def test_userfuncs(): + # Dictionary mutation test + some_function = symbols("some_function", cls=Function) + my_user_functions = {"some_function": "SomeFunction"} + assert mcode( + some_function(z), + user_functions=my_user_functions) == \ + 'SomeFunction[z]' + assert mcode( + some_function(z), + user_functions=my_user_functions) == \ + 'SomeFunction[z]' + + # List argument test + my_user_functions = \ + {"some_function": [(lambda x: True, "SomeOtherFunction")]} + assert mcode( + some_function(z), + user_functions=my_user_functions) == \ + 'SomeOtherFunction[z]' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathml.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathml.py new file mode 100644 index 0000000000000000000000000000000000000000..4e7c2253c98fb1a4e99375774ad158df9b80b439 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_mathml.py @@ -0,0 +1,2048 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.concrete.summations import Sum +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.function import Derivative, Lambda, diff, Function +from sympy.core.numbers import (zoo, Float, Integer, I, oo, pi, E, + Rational) +from sympy.core.relational import Lt, Ge, Ne, Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols, Symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import (factorial2, + binomial, factorial) +from sympy.functions.combinatorial.numbers import (lucas, bell, + catalan, euler, tribonacci, fibonacci, bernoulli, primenu, primeomega, + totient, reduced_totient) +from sympy.functions.elementary.complexes import re, im, conjugate, Abs +from sympy.functions.elementary.exponential import exp, LambertW, log +from sympy.functions.elementary.hyperbolic import (tanh, acoth, atanh, + coth, asinh, acsch, asech, acosh, csch, sinh, cosh, sech) +from sympy.functions.elementary.integers import ceiling, floor +from sympy.functions.elementary.miscellaneous import Max, Min +from sympy.functions.elementary.trigonometric import (csc, sec, tan, + atan, sin, asec, cot, cos, acot, acsc, asin, acos) +from sympy.functions.special.delta_functions import Heaviside +from sympy.functions.special.elliptic_integrals import (elliptic_pi, + elliptic_f, elliptic_k, elliptic_e) +from sympy.functions.special.error_functions import (fresnelc, + fresnels, Ei, expint) +from sympy.functions.special.gamma_functions import (gamma, uppergamma, + lowergamma) +from sympy.functions.special.mathieu_functions import (mathieusprime, + mathieus, mathieucprime, mathieuc) +from sympy.functions.special.polynomials import (jacobi, chebyshevu, + chebyshevt, hermite, assoc_legendre, gegenbauer, assoc_laguerre, + legendre, laguerre) +from sympy.functions.special.singularity_functions import SingularityFunction +from sympy.functions.special.zeta_functions import (polylog, stieltjes, + lerchphi, dirichlet_eta, zeta) +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (Xor, Or, false, true, And, Equivalent, + Implies, Not) +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.determinant import Determinant +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.physics.quantum import (ComplexSpace, FockSpace, hbar, + HilbertSpace, Dagger) +from sympy.printing.mathml import (MathMLPresentationPrinter, + MathMLPrinter, MathMLContentPrinter, mathml) +from sympy.series.limits import Limit +from sympy.sets.contains import Contains +from sympy.sets.fancysets import Range +from sympy.sets.sets import (Interval, Union, SymmetricDifference, + Complement, FiniteSet, Intersection, ProductSet) +from sympy.stats.rv import RandomSymbol +from sympy.tensor.indexed import IndexedBase +from sympy.vector import (Divergence, CoordSys3D, Cross, Curl, Dot, + Laplacian, Gradient) +from sympy.testing.pytest import raises, XFAIL + +x, y, z, a, b, c, d, e, n = symbols('x:z a:e n') +mp = MathMLContentPrinter() +mpp = MathMLPresentationPrinter() + + +def test_mathml_printer(): + m = MathMLPrinter() + assert m.doprint(1+x) == mp.doprint(1+x) + + +def test_content_printmethod(): + assert mp.doprint(1 + x) == 'x1' + + +def test_content_mathml_core(): + mml_1 = mp._print(1 + x) + assert mml_1.nodeName == 'apply' + nodes = mml_1.childNodes + assert len(nodes) == 3 + assert nodes[0].nodeName == 'plus' + assert nodes[0].hasChildNodes() is False + assert nodes[0].nodeValue is None + assert nodes[1].nodeName in ['cn', 'ci'] + if nodes[1].nodeName == 'cn': + assert nodes[1].childNodes[0].nodeValue == '1' + assert nodes[2].childNodes[0].nodeValue == 'x' + else: + assert nodes[1].childNodes[0].nodeValue == 'x' + assert nodes[2].childNodes[0].nodeValue == '1' + + mml_2 = mp._print(x**2) + assert mml_2.nodeName == 'apply' + nodes = mml_2.childNodes + assert nodes[1].childNodes[0].nodeValue == 'x' + assert nodes[2].childNodes[0].nodeValue == '2' + + mml_3 = mp._print(2*x) + assert mml_3.nodeName == 'apply' + nodes = mml_3.childNodes + assert nodes[0].nodeName == 'times' + assert nodes[1].childNodes[0].nodeValue == '2' + assert nodes[2].childNodes[0].nodeValue == 'x' + + mml = mp._print(Float(1.0, 2)*x) + assert mml.nodeName == 'apply' + nodes = mml.childNodes + assert nodes[0].nodeName == 'times' + assert nodes[1].childNodes[0].nodeValue == '1.0' + assert nodes[2].childNodes[0].nodeValue == 'x' + + +def test_content_mathml_functions(): + mml_1 = mp._print(sin(x)) + assert mml_1.nodeName == 'apply' + assert mml_1.childNodes[0].nodeName == 'sin' + assert mml_1.childNodes[1].nodeName == 'ci' + + mml_2 = mp._print(diff(sin(x), x, evaluate=False)) + assert mml_2.nodeName == 'apply' + assert mml_2.childNodes[0].nodeName == 'diff' + assert mml_2.childNodes[1].nodeName == 'bvar' + assert mml_2.childNodes[1].childNodes[ + 0].nodeName == 'ci' # below bvar there's x/ci> + + mml_3 = mp._print(diff(cos(x*y), x, evaluate=False)) + assert mml_3.nodeName == 'apply' + assert mml_3.childNodes[0].nodeName == 'partialdiff' + assert mml_3.childNodes[1].nodeName == 'bvar' + assert mml_3.childNodes[1].childNodes[ + 0].nodeName == 'ci' # below bvar there's x/ci> + + mml_4 = mp._print(Lambda((x, y), x * y)) + assert mml_4.nodeName == 'lambda' + assert mml_4.childNodes[0].nodeName == 'bvar' + assert mml_4.childNodes[0].childNodes[ + 0].nodeName == 'ci' # below bvar there's x/ci> + assert mml_4.childNodes[1].nodeName == 'bvar' + assert mml_4.childNodes[1].childNodes[ + 0].nodeName == 'ci' # below bvar there's y/ci> + assert mml_4.childNodes[2].nodeName == 'apply' + + +def test_content_mathml_limits(): + # XXX No unevaluated limits + lim_fun = sin(x)/x + mml_1 = mp._print(Limit(lim_fun, x, 0)) + assert mml_1.childNodes[0].nodeName == 'limit' + assert mml_1.childNodes[1].nodeName == 'bvar' + assert mml_1.childNodes[2].nodeName == 'lowlimit' + assert mml_1.childNodes[3].toxml() == mp._print(lim_fun).toxml() + + +def test_content_mathml_integrals(): + integrand = x + mml_1 = mp._print(Integral(integrand, (x, 0, 1))) + assert mml_1.childNodes[0].nodeName == 'int' + assert mml_1.childNodes[1].nodeName == 'bvar' + assert mml_1.childNodes[2].nodeName == 'lowlimit' + assert mml_1.childNodes[3].nodeName == 'uplimit' + assert mml_1.childNodes[4].toxml() == mp._print(integrand).toxml() + + +def test_content_mathml_matrices(): + A = Matrix([1, 2, 3]) + B = Matrix([[0, 5, 4], [2, 3, 1], [9, 7, 9]]) + mll_1 = mp._print(A) + assert mll_1.childNodes[0].nodeName == 'matrixrow' + assert mll_1.childNodes[0].childNodes[0].nodeName == 'cn' + assert mll_1.childNodes[0].childNodes[0].childNodes[0].nodeValue == '1' + assert mll_1.childNodes[1].nodeName == 'matrixrow' + assert mll_1.childNodes[1].childNodes[0].nodeName == 'cn' + assert mll_1.childNodes[1].childNodes[0].childNodes[0].nodeValue == '2' + assert mll_1.childNodes[2].nodeName == 'matrixrow' + assert mll_1.childNodes[2].childNodes[0].nodeName == 'cn' + assert mll_1.childNodes[2].childNodes[0].childNodes[0].nodeValue == '3' + mll_2 = mp._print(B) + assert mll_2.childNodes[0].nodeName == 'matrixrow' + assert mll_2.childNodes[0].childNodes[0].nodeName == 'cn' + assert mll_2.childNodes[0].childNodes[0].childNodes[0].nodeValue == '0' + assert mll_2.childNodes[0].childNodes[1].nodeName == 'cn' + assert mll_2.childNodes[0].childNodes[1].childNodes[0].nodeValue == '5' + assert mll_2.childNodes[0].childNodes[2].nodeName == 'cn' + assert mll_2.childNodes[0].childNodes[2].childNodes[0].nodeValue == '4' + assert mll_2.childNodes[1].nodeName == 'matrixrow' + assert mll_2.childNodes[1].childNodes[0].nodeName == 'cn' + assert mll_2.childNodes[1].childNodes[0].childNodes[0].nodeValue == '2' + assert mll_2.childNodes[1].childNodes[1].nodeName == 'cn' + assert mll_2.childNodes[1].childNodes[1].childNodes[0].nodeValue == '3' + assert mll_2.childNodes[1].childNodes[2].nodeName == 'cn' + assert mll_2.childNodes[1].childNodes[2].childNodes[0].nodeValue == '1' + assert mll_2.childNodes[2].nodeName == 'matrixrow' + assert mll_2.childNodes[2].childNodes[0].nodeName == 'cn' + assert mll_2.childNodes[2].childNodes[0].childNodes[0].nodeValue == '9' + assert mll_2.childNodes[2].childNodes[1].nodeName == 'cn' + assert mll_2.childNodes[2].childNodes[1].childNodes[0].nodeValue == '7' + assert mll_2.childNodes[2].childNodes[2].nodeName == 'cn' + assert mll_2.childNodes[2].childNodes[2].childNodes[0].nodeValue == '9' + + +def test_content_mathml_sums(): + summand = x + mml_1 = mp._print(Sum(summand, (x, 1, 10))) + assert mml_1.childNodes[0].nodeName == 'sum' + assert mml_1.childNodes[1].nodeName == 'bvar' + assert mml_1.childNodes[2].nodeName == 'lowlimit' + assert mml_1.childNodes[3].nodeName == 'uplimit' + assert mml_1.childNodes[4].toxml() == mp._print(summand).toxml() + + +def test_content_mathml_tuples(): + mml_1 = mp._print([2]) + assert mml_1.nodeName == 'list' + assert mml_1.childNodes[0].nodeName == 'cn' + assert len(mml_1.childNodes) == 1 + + mml_2 = mp._print([2, Integer(1)]) + assert mml_2.nodeName == 'list' + assert mml_2.childNodes[0].nodeName == 'cn' + assert mml_2.childNodes[1].nodeName == 'cn' + assert len(mml_2.childNodes) == 2 + + +def test_content_mathml_add(): + mml = mp._print(x**5 - x**4 + x) + assert mml.childNodes[0].nodeName == 'plus' + assert mml.childNodes[1].childNodes[0].nodeName == 'minus' + assert mml.childNodes[1].childNodes[1].nodeName == 'apply' + + +def test_content_mathml_Rational(): + mml_1 = mp._print(Rational(1, 1)) + """should just return a number""" + assert mml_1.nodeName == 'cn' + + mml_2 = mp._print(Rational(2, 5)) + assert mml_2.childNodes[0].nodeName == 'divide' + + +def test_content_mathml_constants(): + mml = mp._print(I) + assert mml.nodeName == 'imaginaryi' + + mml = mp._print(E) + assert mml.nodeName == 'exponentiale' + + mml = mp._print(oo) + assert mml.nodeName == 'infinity' + + mml = mp._print(pi) + assert mml.nodeName == 'pi' + + assert mathml(hbar) == '' + assert mathml(S.TribonacciConstant) == '' + assert mathml(S.GoldenRatio) == 'φ' + mml = mathml(S.EulerGamma) + assert mml == '' + + mml = mathml(S.EmptySet) + assert mml == '' + + mml = mathml(S.true) + assert mml == '' + + mml = mathml(S.false) + assert mml == '' + + mml = mathml(S.NaN) + assert mml == '' + + +def test_content_mathml_trig(): + mml = mp._print(sin(x)) + assert mml.childNodes[0].nodeName == 'sin' + + mml = mp._print(cos(x)) + assert mml.childNodes[0].nodeName == 'cos' + + mml = mp._print(tan(x)) + assert mml.childNodes[0].nodeName == 'tan' + + mml = mp._print(cot(x)) + assert mml.childNodes[0].nodeName == 'cot' + + mml = mp._print(csc(x)) + assert mml.childNodes[0].nodeName == 'csc' + + mml = mp._print(sec(x)) + assert mml.childNodes[0].nodeName == 'sec' + + mml = mp._print(asin(x)) + assert mml.childNodes[0].nodeName == 'arcsin' + + mml = mp._print(acos(x)) + assert mml.childNodes[0].nodeName == 'arccos' + + mml = mp._print(atan(x)) + assert mml.childNodes[0].nodeName == 'arctan' + + mml = mp._print(acot(x)) + assert mml.childNodes[0].nodeName == 'arccot' + + mml = mp._print(acsc(x)) + assert mml.childNodes[0].nodeName == 'arccsc' + + mml = mp._print(asec(x)) + assert mml.childNodes[0].nodeName == 'arcsec' + + mml = mp._print(sinh(x)) + assert mml.childNodes[0].nodeName == 'sinh' + + mml = mp._print(cosh(x)) + assert mml.childNodes[0].nodeName == 'cosh' + + mml = mp._print(tanh(x)) + assert mml.childNodes[0].nodeName == 'tanh' + + mml = mp._print(coth(x)) + assert mml.childNodes[0].nodeName == 'coth' + + mml = mp._print(csch(x)) + assert mml.childNodes[0].nodeName == 'csch' + + mml = mp._print(sech(x)) + assert mml.childNodes[0].nodeName == 'sech' + + mml = mp._print(asinh(x)) + assert mml.childNodes[0].nodeName == 'arcsinh' + + mml = mp._print(atanh(x)) + assert mml.childNodes[0].nodeName == 'arctanh' + + mml = mp._print(acosh(x)) + assert mml.childNodes[0].nodeName == 'arccosh' + + mml = mp._print(acoth(x)) + assert mml.childNodes[0].nodeName == 'arccoth' + + mml = mp._print(acsch(x)) + assert mml.childNodes[0].nodeName == 'arccsch' + + mml = mp._print(asech(x)) + assert mml.childNodes[0].nodeName == 'arcsech' + + +def test_content_mathml_relational(): + mml_1 = mp._print(Eq(x, 1)) + assert mml_1.nodeName == 'apply' + assert mml_1.childNodes[0].nodeName == 'eq' + assert mml_1.childNodes[1].nodeName == 'ci' + assert mml_1.childNodes[1].childNodes[0].nodeValue == 'x' + assert mml_1.childNodes[2].nodeName == 'cn' + assert mml_1.childNodes[2].childNodes[0].nodeValue == '1' + + mml_2 = mp._print(Ne(1, x)) + assert mml_2.nodeName == 'apply' + assert mml_2.childNodes[0].nodeName == 'neq' + assert mml_2.childNodes[1].nodeName == 'cn' + assert mml_2.childNodes[1].childNodes[0].nodeValue == '1' + assert mml_2.childNodes[2].nodeName == 'ci' + assert mml_2.childNodes[2].childNodes[0].nodeValue == 'x' + + mml_3 = mp._print(Ge(1, x)) + assert mml_3.nodeName == 'apply' + assert mml_3.childNodes[0].nodeName == 'geq' + assert mml_3.childNodes[1].nodeName == 'cn' + assert mml_3.childNodes[1].childNodes[0].nodeValue == '1' + assert mml_3.childNodes[2].nodeName == 'ci' + assert mml_3.childNodes[2].childNodes[0].nodeValue == 'x' + + mml_4 = mp._print(Lt(1, x)) + assert mml_4.nodeName == 'apply' + assert mml_4.childNodes[0].nodeName == 'lt' + assert mml_4.childNodes[1].nodeName == 'cn' + assert mml_4.childNodes[1].childNodes[0].nodeValue == '1' + assert mml_4.childNodes[2].nodeName == 'ci' + assert mml_4.childNodes[2].childNodes[0].nodeValue == 'x' + + +def test_content_symbol(): + mml = mp._print(x) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeValue == 'x' + del mml + + mml = mp._print(Symbol("x^2")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mp._print(Symbol("x__2")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mp._print(Symbol("x_2")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msub' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mp._print(Symbol("x^3_2")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msubsup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '2' + assert mml.childNodes[0].childNodes[2].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[2].childNodes[0].nodeValue == '3' + del mml + + mml = mp._print(Symbol("x__3_2")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msubsup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '2' + assert mml.childNodes[0].childNodes[2].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[2].childNodes[0].nodeValue == '3' + del mml + + mml = mp._print(Symbol("x_2_a")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msub' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mrow' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].childNodes[ + 0].nodeValue == '2' + assert mml.childNodes[0].childNodes[1].childNodes[1].nodeName == 'mml:mo' + assert mml.childNodes[0].childNodes[1].childNodes[1].childNodes[ + 0].nodeValue == ' ' + assert mml.childNodes[0].childNodes[1].childNodes[2].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[2].childNodes[ + 0].nodeValue == 'a' + del mml + + mml = mp._print(Symbol("x^2^a")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mrow' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].childNodes[ + 0].nodeValue == '2' + assert mml.childNodes[0].childNodes[1].childNodes[1].nodeName == 'mml:mo' + assert mml.childNodes[0].childNodes[1].childNodes[1].childNodes[ + 0].nodeValue == ' ' + assert mml.childNodes[0].childNodes[1].childNodes[2].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[2].childNodes[ + 0].nodeValue == 'a' + del mml + + mml = mp._print(Symbol("x__2__a")) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeName == 'mml:msup' + assert mml.childNodes[0].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].nodeName == 'mml:mrow' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[0].childNodes[ + 0].nodeValue == '2' + assert mml.childNodes[0].childNodes[1].childNodes[1].nodeName == 'mml:mo' + assert mml.childNodes[0].childNodes[1].childNodes[1].childNodes[ + 0].nodeValue == ' ' + assert mml.childNodes[0].childNodes[1].childNodes[2].nodeName == 'mml:mi' + assert mml.childNodes[0].childNodes[1].childNodes[2].childNodes[ + 0].nodeValue == 'a' + del mml + + +def test_content_mathml_greek(): + mml = mp._print(Symbol('alpha')) + assert mml.nodeName == 'ci' + assert mml.childNodes[0].nodeValue == '\N{GREEK SMALL LETTER ALPHA}' + + assert mp.doprint(Symbol('alpha')) == 'α' + assert mp.doprint(Symbol('beta')) == 'β' + assert mp.doprint(Symbol('gamma')) == 'γ' + assert mp.doprint(Symbol('delta')) == 'δ' + assert mp.doprint(Symbol('epsilon')) == 'ε' + assert mp.doprint(Symbol('zeta')) == 'ζ' + assert mp.doprint(Symbol('eta')) == 'η' + assert mp.doprint(Symbol('theta')) == 'θ' + assert mp.doprint(Symbol('iota')) == 'ι' + assert mp.doprint(Symbol('kappa')) == 'κ' + assert mp.doprint(Symbol('lambda')) == 'λ' + assert mp.doprint(Symbol('mu')) == 'μ' + assert mp.doprint(Symbol('nu')) == 'ν' + assert mp.doprint(Symbol('xi')) == 'ξ' + assert mp.doprint(Symbol('omicron')) == 'ο' + assert mp.doprint(Symbol('pi')) == 'π' + assert mp.doprint(Symbol('rho')) == 'ρ' + assert mp.doprint(Symbol('varsigma')) == 'ς' + assert mp.doprint(Symbol('sigma')) == 'σ' + assert mp.doprint(Symbol('tau')) == 'τ' + assert mp.doprint(Symbol('upsilon')) == 'υ' + assert mp.doprint(Symbol('phi')) == 'φ' + assert mp.doprint(Symbol('chi')) == 'χ' + assert mp.doprint(Symbol('psi')) == 'ψ' + assert mp.doprint(Symbol('omega')) == 'ω' + + assert mp.doprint(Symbol('Alpha')) == 'Α' + assert mp.doprint(Symbol('Beta')) == 'Β' + assert mp.doprint(Symbol('Gamma')) == 'Γ' + assert mp.doprint(Symbol('Delta')) == 'Δ' + assert mp.doprint(Symbol('Epsilon')) == 'Ε' + assert mp.doprint(Symbol('Zeta')) == 'Ζ' + assert mp.doprint(Symbol('Eta')) == 'Η' + assert mp.doprint(Symbol('Theta')) == 'Θ' + assert mp.doprint(Symbol('Iota')) == 'Ι' + assert mp.doprint(Symbol('Kappa')) == 'Κ' + assert mp.doprint(Symbol('Lambda')) == 'Λ' + assert mp.doprint(Symbol('Mu')) == 'Μ' + assert mp.doprint(Symbol('Nu')) == 'Ν' + assert mp.doprint(Symbol('Xi')) == 'Ξ' + assert mp.doprint(Symbol('Omicron')) == 'Ο' + assert mp.doprint(Symbol('Pi')) == 'Π' + assert mp.doprint(Symbol('Rho')) == 'Ρ' + assert mp.doprint(Symbol('Sigma')) == 'Σ' + assert mp.doprint(Symbol('Tau')) == 'Τ' + assert mp.doprint(Symbol('Upsilon')) == 'Υ' + assert mp.doprint(Symbol('Phi')) == 'Φ' + assert mp.doprint(Symbol('Chi')) == 'Χ' + assert mp.doprint(Symbol('Psi')) == 'Ψ' + assert mp.doprint(Symbol('Omega')) == 'Ω' + + +def test_content_mathml_order(): + expr = x**3 + x**2*y + 3*x*y**3 + y**4 + + mp = MathMLContentPrinter({'order': 'lex'}) + mml = mp._print(expr) + + assert mml.childNodes[1].childNodes[0].nodeName == 'power' + assert mml.childNodes[1].childNodes[1].childNodes[0].data == 'x' + assert mml.childNodes[1].childNodes[2].childNodes[0].data == '3' + + assert mml.childNodes[4].childNodes[0].nodeName == 'power' + assert mml.childNodes[4].childNodes[1].childNodes[0].data == 'y' + assert mml.childNodes[4].childNodes[2].childNodes[0].data == '4' + + mp = MathMLContentPrinter({'order': 'rev-lex'}) + mml = mp._print(expr) + + assert mml.childNodes[1].childNodes[0].nodeName == 'power' + assert mml.childNodes[1].childNodes[1].childNodes[0].data == 'y' + assert mml.childNodes[1].childNodes[2].childNodes[0].data == '4' + + assert mml.childNodes[4].childNodes[0].nodeName == 'power' + assert mml.childNodes[4].childNodes[1].childNodes[0].data == 'x' + assert mml.childNodes[4].childNodes[2].childNodes[0].data == '3' + + +def test_content_settings(): + raises(TypeError, lambda: mathml(x, method="garbage")) + + +def test_content_mathml_logic(): + assert mathml(And(x, y)) == 'xy' + assert mathml(Or(x, y)) == 'xy' + assert mathml(Xor(x, y)) == 'xy' + assert mathml(Implies(x, y)) == 'xy' + assert mathml(Not(x)) == 'x' + + +def test_content_finite_sets(): + assert mathml(FiniteSet(a)) == 'a' + assert mathml(FiniteSet(a, b)) == 'ab' + assert mathml(FiniteSet(FiniteSet(a, b), c)) == \ + 'cab' + + A = FiniteSet(a) + B = FiniteSet(b) + C = FiniteSet(c) + D = FiniteSet(d) + + U1 = Union(A, B, evaluate=False) + U2 = Union(C, D, evaluate=False) + I1 = Intersection(A, B, evaluate=False) + I2 = Intersection(C, D, evaluate=False) + C1 = Complement(A, B, evaluate=False) + C2 = Complement(C, D, evaluate=False) + # XXX ProductSet does not support evaluate keyword + P1 = ProductSet(A, B) + P2 = ProductSet(C, D) + + assert mathml(U1) == \ + 'ab' + assert mathml(I1) == \ + 'ab' \ + '' + assert mathml(C1) == \ + 'ab' + assert mathml(P1) == \ + 'ab' \ + '' + + assert mathml(Intersection(A, U2, evaluate=False)) == \ + 'a' \ + 'cd' + assert mathml(Intersection(U1, U2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + + # XXX Does the parenthesis appear correctly for these examples in mathjax? + assert mathml(Intersection(C1, C2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(Intersection(P1, P2, evaluate=False)) == \ + 'a' \ + 'b' \ + 'cd' + + assert mathml(Union(A, I2, evaluate=False)) == \ + 'a' \ + 'cd' + assert mathml(Union(I1, I2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(Union(C1, C2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(Union(P1, P2, evaluate=False)) == \ + 'a' \ + 'b' \ + 'cd' + + assert mathml(Complement(A, C2, evaluate=False)) == \ + 'a' \ + 'cd' + assert mathml(Complement(U1, U2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(Complement(I1, I2, evaluate=False)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(Complement(P1, P2, evaluate=False)) == \ + 'a' \ + 'b' \ + 'cd' + + assert mathml(ProductSet(A, P2)) == \ + 'a' \ + 'c' \ + 'd' + assert mathml(ProductSet(U1, U2)) == \ + 'a' \ + 'bc' \ + 'd' + assert mathml(ProductSet(I1, I2)) == \ + 'a' \ + 'b' \ + 'cd' + assert mathml(ProductSet(C1, C2)) == \ + 'a' \ + 'b' \ + 'cd' + + +def test_presentation_printmethod(): + assert mpp.doprint(1 + x) == 'x+1' + assert mpp.doprint(x**2) == 'x2' + assert mpp.doprint(x**-1) == '1x' + assert mpp.doprint(x**-2) == \ + '1x2' + assert mpp.doprint(2*x) == \ + '2x' + + +def test_presentation_mathml_core(): + mml_1 = mpp._print(1 + x) + assert mml_1.nodeName == 'mrow' + nodes = mml_1.childNodes + assert len(nodes) == 3 + assert nodes[0].nodeName in ['mi', 'mn'] + assert nodes[1].nodeName == 'mo' + if nodes[0].nodeName == 'mn': + assert nodes[0].childNodes[0].nodeValue == '1' + assert nodes[2].childNodes[0].nodeValue == 'x' + else: + assert nodes[0].childNodes[0].nodeValue == 'x' + assert nodes[2].childNodes[0].nodeValue == '1' + + mml_2 = mpp._print(x**2) + assert mml_2.nodeName == 'msup' + nodes = mml_2.childNodes + assert nodes[0].childNodes[0].nodeValue == 'x' + assert nodes[1].childNodes[0].nodeValue == '2' + + mml_3 = mpp._print(2*x) + assert mml_3.nodeName == 'mrow' + nodes = mml_3.childNodes + assert nodes[0].childNodes[0].nodeValue == '2' + assert nodes[1].childNodes[0].nodeValue == '⁢' + assert nodes[2].childNodes[0].nodeValue == 'x' + + mml = mpp._print(Float(1.0, 2)*x) + assert mml.nodeName == 'mrow' + nodes = mml.childNodes + assert nodes[0].childNodes[0].nodeValue == '1.0' + assert nodes[1].childNodes[0].nodeValue == '⁢' + assert nodes[2].childNodes[0].nodeValue == 'x' + + +def test_presentation_mathml_functions(): + mml_1 = mpp._print(sin(x)) + assert mml_1.childNodes[0].childNodes[0 + ].nodeValue == 'sin' + assert mml_1.childNodes[1].childNodes[1 + ].childNodes[0].nodeValue == 'x' + + mml_2 = mpp._print(diff(sin(x), x, evaluate=False)) + assert mml_2.nodeName == 'mrow' + assert mml_2.childNodes[0].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == 'ⅆ' + assert mml_2.childNodes[1].childNodes[1 + ].nodeName == 'mrow' + assert mml_2.childNodes[0].childNodes[1 + ].childNodes[0].childNodes[0].nodeValue == 'ⅆ' + + mml_3 = mpp._print(diff(cos(x*y), x, evaluate=False)) + assert mml_3.childNodes[0].nodeName == 'mfrac' + assert mml_3.childNodes[0].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '∂' + assert mml_3.childNodes[1].childNodes[0 + ].childNodes[0].nodeValue == 'cos' + + +def test_print_derivative(): + f = Function('f') + d = Derivative(f(x, y, z), x, z, x, z, z, y) + assert mathml(d) == \ + 'yz2xzxxyz' + assert mathml(d, printer='presentation') == \ + '6y2zxzxf(x,y,z)' + + +def test_presentation_mathml_limits(): + lim_fun = sin(x)/x + mml_1 = mpp._print(Limit(lim_fun, x, 0)) + assert mml_1.childNodes[0].nodeName == 'munder' + assert mml_1.childNodes[0].childNodes[0 + ].childNodes[0].nodeValue == 'lim' + assert mml_1.childNodes[0].childNodes[1 + ].childNodes[0].childNodes[0 + ].nodeValue == 'x' + assert mml_1.childNodes[0].childNodes[1 + ].childNodes[1].childNodes[0 + ].nodeValue == '→' + assert mml_1.childNodes[0].childNodes[1 + ].childNodes[2].childNodes[0 + ].nodeValue == '0' + + +def test_presentation_mathml_integrals(): + assert mpp.doprint(Integral(x, (x, 0, 1))) == \ + '01'\ + 'xx' + assert mpp.doprint(Integral(log(x), x)) == \ + 'log(x' \ + ')x' + assert mpp.doprint(Integral(x*y, x, y)) == \ + 'x'\ + 'yyx' + z, w = symbols('z w') + assert mpp.doprint(Integral(x*y*z, x, y, z)) == \ + 'x'\ + 'yz'\ + 'zyx' + assert mpp.doprint(Integral(x*y*z*w, x, y, z, w)) == \ + ''\ + 'w'\ + 'xy'\ + 'zw'\ + 'zyx' + assert mpp.doprint(Integral(x, x, y, (z, 0, 1))) == \ + '01'\ + 'xz'\ + 'yx' + assert mpp.doprint(Integral(x, (x, 0))) == \ + '0x'\ + 'x' + + +def test_presentation_mathml_matrices(): + A = Matrix([1, 2, 3]) + B = Matrix([[0, 5, 4], [2, 3, 1], [9, 7, 9]]) + mll_1 = mpp._print(A) + assert mll_1.childNodes[1].nodeName == 'mtable' + assert mll_1.childNodes[1].childNodes[0].nodeName == 'mtr' + assert len(mll_1.childNodes[1].childNodes) == 3 + assert mll_1.childNodes[1].childNodes[0].childNodes[0].nodeName == 'mtd' + assert len(mll_1.childNodes[1].childNodes[0].childNodes) == 1 + assert mll_1.childNodes[1].childNodes[0].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '1' + assert mll_1.childNodes[1].childNodes[1].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '2' + assert mll_1.childNodes[1].childNodes[2].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '3' + mll_2 = mpp._print(B) + assert mll_2.childNodes[1].nodeName == 'mtable' + assert mll_2.childNodes[1].childNodes[0].nodeName == 'mtr' + assert len(mll_2.childNodes[1].childNodes) == 3 + assert mll_2.childNodes[1].childNodes[0].childNodes[0].nodeName == 'mtd' + assert len(mll_2.childNodes[1].childNodes[0].childNodes) == 3 + assert mll_2.childNodes[1].childNodes[0].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '0' + assert mll_2.childNodes[1].childNodes[0].childNodes[1 + ].childNodes[0].childNodes[0].nodeValue == '5' + assert mll_2.childNodes[1].childNodes[0].childNodes[2 + ].childNodes[0].childNodes[0].nodeValue == '4' + assert mll_2.childNodes[1].childNodes[1].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '2' + assert mll_2.childNodes[1].childNodes[1].childNodes[1 + ].childNodes[0].childNodes[0].nodeValue == '3' + assert mll_2.childNodes[1].childNodes[1].childNodes[2 + ].childNodes[0].childNodes[0].nodeValue == '1' + assert mll_2.childNodes[1].childNodes[2].childNodes[0 + ].childNodes[0].childNodes[0].nodeValue == '9' + assert mll_2.childNodes[1].childNodes[2].childNodes[1 + ].childNodes[0].childNodes[0].nodeValue == '7' + assert mll_2.childNodes[1].childNodes[2].childNodes[2 + ].childNodes[0].childNodes[0].nodeValue == '9' + + +def test_presentation_mathml_sums(): + mml_1 = mpp._print(Sum(x, (x, 1, 10))) + assert mml_1.childNodes[0].nodeName == 'munderover' + assert len(mml_1.childNodes[0].childNodes) == 3 + assert mml_1.childNodes[0].childNodes[0].childNodes[0 + ].nodeValue == '∑' + assert len(mml_1.childNodes[0].childNodes[1].childNodes) == 3 + assert mml_1.childNodes[0].childNodes[2].childNodes[0 + ].nodeValue == '10' + assert mml_1.childNodes[1].childNodes[0].nodeValue == 'x' + + assert mpp.doprint(Sum(x, (x, 1, 10))) == \ + 'x=110x' + assert mpp.doprint(Sum(x + y, (x, 1, 10))) == \ + 'x=110(x+y)' + + +def test_presentation_mathml_add(): + mml = mpp._print(x**5 - x**4 + x) + assert len(mml.childNodes) == 5 + assert mml.childNodes[0].childNodes[0].childNodes[0 + ].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].childNodes[0 + ].nodeValue == '5' + assert mml.childNodes[1].childNodes[0].nodeValue == '-' + assert mml.childNodes[2].childNodes[0].childNodes[0 + ].nodeValue == 'x' + assert mml.childNodes[2].childNodes[1].childNodes[0 + ].nodeValue == '4' + assert mml.childNodes[3].childNodes[0].nodeValue == '+' + assert mml.childNodes[4].childNodes[0].nodeValue == 'x' + + +def test_presentation_mathml_Rational(): + mml_1 = mpp._print(Rational(1, 1)) + assert mml_1.nodeName == 'mn' + + mml_2 = mpp._print(Rational(2, 5)) + assert mml_2.nodeName == 'mfrac' + assert mml_2.childNodes[0].childNodes[0].nodeValue == '2' + assert mml_2.childNodes[1].childNodes[0].nodeValue == '5' + + +def test_presentation_mathml_constants(): + mml = mpp._print(I) + assert mml.childNodes[0].nodeValue == 'ⅈ' + + mml = mpp._print(E) + assert mml.childNodes[0].nodeValue == 'ⅇ' + + mml = mpp._print(oo) + assert mml.childNodes[0].nodeValue == '∞' + + mml = mpp._print(pi) + assert mml.childNodes[0].nodeValue == 'π' + + assert mathml(hbar, printer='presentation') == '' + assert mathml(S.TribonacciConstant, printer='presentation' + ) == 'TribonacciConstant' + assert mathml(S.EulerGamma, printer='presentation' + ) == 'γ' + assert mathml(S.GoldenRatio, printer='presentation' + ) == 'Φ' + + assert mathml(zoo, printer='presentation') == \ + '~' + + assert mathml(S.NaN, printer='presentation') == 'NaN' + +def test_presentation_mathml_trig(): + mml = mpp._print(sin(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'sin' + + mml = mpp._print(cos(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'cos' + + mml = mpp._print(tan(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'tan' + + mml = mpp._print(asin(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arcsin' + + mml = mpp._print(acos(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arccos' + + mml = mpp._print(atan(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arctan' + + mml = mpp._print(sinh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'sinh' + + mml = mpp._print(cosh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'cosh' + + mml = mpp._print(tanh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'tanh' + + mml = mpp._print(asinh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arcsinh' + + mml = mpp._print(atanh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arctanh' + + mml = mpp._print(acosh(x)) + assert mml.childNodes[0].childNodes[0].nodeValue == 'arccosh' + + +def test_presentation_mathml_relational(): + mml_1 = mpp._print(Eq(x, 1)) + assert len(mml_1.childNodes) == 3 + assert mml_1.childNodes[0].nodeName == 'mi' + assert mml_1.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml_1.childNodes[1].nodeName == 'mo' + assert mml_1.childNodes[1].childNodes[0].nodeValue == '=' + assert mml_1.childNodes[2].nodeName == 'mn' + assert mml_1.childNodes[2].childNodes[0].nodeValue == '1' + + mml_2 = mpp._print(Ne(1, x)) + assert len(mml_2.childNodes) == 3 + assert mml_2.childNodes[0].nodeName == 'mn' + assert mml_2.childNodes[0].childNodes[0].nodeValue == '1' + assert mml_2.childNodes[1].nodeName == 'mo' + assert mml_2.childNodes[1].childNodes[0].nodeValue == '≠' + assert mml_2.childNodes[2].nodeName == 'mi' + assert mml_2.childNodes[2].childNodes[0].nodeValue == 'x' + + mml_3 = mpp._print(Ge(1, x)) + assert len(mml_3.childNodes) == 3 + assert mml_3.childNodes[0].nodeName == 'mn' + assert mml_3.childNodes[0].childNodes[0].nodeValue == '1' + assert mml_3.childNodes[1].nodeName == 'mo' + assert mml_3.childNodes[1].childNodes[0].nodeValue == '≥' + assert mml_3.childNodes[2].nodeName == 'mi' + assert mml_3.childNodes[2].childNodes[0].nodeValue == 'x' + + mml_4 = mpp._print(Lt(1, x)) + assert len(mml_4.childNodes) == 3 + assert mml_4.childNodes[0].nodeName == 'mn' + assert mml_4.childNodes[0].childNodes[0].nodeValue == '1' + assert mml_4.childNodes[1].nodeName == 'mo' + assert mml_4.childNodes[1].childNodes[0].nodeValue == '<' + assert mml_4.childNodes[2].nodeName == 'mi' + assert mml_4.childNodes[2].childNodes[0].nodeValue == 'x' + + +def test_presentation_symbol(): + mml = mpp._print(x) + assert mml.nodeName == 'mi' + assert mml.childNodes[0].nodeValue == 'x' + del mml + + mml = mpp._print(Symbol("x^2")) + assert mml.nodeName == 'msup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mpp._print(Symbol("x__2")) + assert mml.nodeName == 'msup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mpp._print(Symbol("x_2")) + assert mml.nodeName == 'msub' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].nodeValue == '2' + del mml + + mml = mpp._print(Symbol("x^3_2")) + assert mml.nodeName == 'msubsup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].nodeValue == '2' + assert mml.childNodes[2].nodeName == 'mi' + assert mml.childNodes[2].childNodes[0].nodeValue == '3' + del mml + + mml = mpp._print(Symbol("x__3_2")) + assert mml.nodeName == 'msubsup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].nodeValue == '2' + assert mml.childNodes[2].nodeName == 'mi' + assert mml.childNodes[2].childNodes[0].nodeValue == '3' + del mml + + mml = mpp._print(Symbol("x_2_a")) + assert mml.nodeName == 'msub' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mrow' + assert mml.childNodes[1].childNodes[0].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].childNodes[0].nodeValue == '2' + assert mml.childNodes[1].childNodes[1].nodeName == 'mo' + assert mml.childNodes[1].childNodes[1].childNodes[0].nodeValue == ' ' + assert mml.childNodes[1].childNodes[2].nodeName == 'mi' + assert mml.childNodes[1].childNodes[2].childNodes[0].nodeValue == 'a' + del mml + + mml = mpp._print(Symbol("x^2^a")) + assert mml.nodeName == 'msup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mrow' + assert mml.childNodes[1].childNodes[0].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].childNodes[0].nodeValue == '2' + assert mml.childNodes[1].childNodes[1].nodeName == 'mo' + assert mml.childNodes[1].childNodes[1].childNodes[0].nodeValue == ' ' + assert mml.childNodes[1].childNodes[2].nodeName == 'mi' + assert mml.childNodes[1].childNodes[2].childNodes[0].nodeValue == 'a' + del mml + + mml = mpp._print(Symbol("x__2__a")) + assert mml.nodeName == 'msup' + assert mml.childNodes[0].nodeName == 'mi' + assert mml.childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[1].nodeName == 'mrow' + assert mml.childNodes[1].childNodes[0].nodeName == 'mi' + assert mml.childNodes[1].childNodes[0].childNodes[0].nodeValue == '2' + assert mml.childNodes[1].childNodes[1].nodeName == 'mo' + assert mml.childNodes[1].childNodes[1].childNodes[0].nodeValue == ' ' + assert mml.childNodes[1].childNodes[2].nodeName == 'mi' + assert mml.childNodes[1].childNodes[2].childNodes[0].nodeValue == 'a' + del mml + + +def test_presentation_mathml_greek(): + mml = mpp._print(Symbol('alpha')) + assert mml.nodeName == 'mi' + assert mml.childNodes[0].nodeValue == '\N{GREEK SMALL LETTER ALPHA}' + + assert mpp.doprint(Symbol('alpha')) == 'α' + assert mpp.doprint(Symbol('beta')) == 'β' + assert mpp.doprint(Symbol('gamma')) == 'γ' + assert mpp.doprint(Symbol('delta')) == 'δ' + assert mpp.doprint(Symbol('epsilon')) == 'ε' + assert mpp.doprint(Symbol('zeta')) == 'ζ' + assert mpp.doprint(Symbol('eta')) == 'η' + assert mpp.doprint(Symbol('theta')) == 'θ' + assert mpp.doprint(Symbol('iota')) == 'ι' + assert mpp.doprint(Symbol('kappa')) == 'κ' + assert mpp.doprint(Symbol('lambda')) == 'λ' + assert mpp.doprint(Symbol('mu')) == 'μ' + assert mpp.doprint(Symbol('nu')) == 'ν' + assert mpp.doprint(Symbol('xi')) == 'ξ' + assert mpp.doprint(Symbol('omicron')) == 'ο' + assert mpp.doprint(Symbol('pi')) == 'π' + assert mpp.doprint(Symbol('rho')) == 'ρ' + assert mpp.doprint(Symbol('varsigma')) == 'ς' + assert mpp.doprint(Symbol('sigma')) == 'σ' + assert mpp.doprint(Symbol('tau')) == 'τ' + assert mpp.doprint(Symbol('upsilon')) == 'υ' + assert mpp.doprint(Symbol('phi')) == 'φ' + assert mpp.doprint(Symbol('chi')) == 'χ' + assert mpp.doprint(Symbol('psi')) == 'ψ' + assert mpp.doprint(Symbol('omega')) == 'ω' + + assert mpp.doprint(Symbol('Alpha')) == 'Α' + assert mpp.doprint(Symbol('Beta')) == 'Β' + assert mpp.doprint(Symbol('Gamma')) == 'Γ' + assert mpp.doprint(Symbol('Delta')) == 'Δ' + assert mpp.doprint(Symbol('Epsilon')) == 'Ε' + assert mpp.doprint(Symbol('Zeta')) == 'Ζ' + assert mpp.doprint(Symbol('Eta')) == 'Η' + assert mpp.doprint(Symbol('Theta')) == 'Θ' + assert mpp.doprint(Symbol('Iota')) == 'Ι' + assert mpp.doprint(Symbol('Kappa')) == 'Κ' + assert mpp.doprint(Symbol('Lambda')) == 'Λ' + assert mpp.doprint(Symbol('Mu')) == 'Μ' + assert mpp.doprint(Symbol('Nu')) == 'Ν' + assert mpp.doprint(Symbol('Xi')) == 'Ξ' + assert mpp.doprint(Symbol('Omicron')) == 'Ο' + assert mpp.doprint(Symbol('Pi')) == 'Π' + assert mpp.doprint(Symbol('Rho')) == 'Ρ' + assert mpp.doprint(Symbol('Sigma')) == 'Σ' + assert mpp.doprint(Symbol('Tau')) == 'Τ' + assert mpp.doprint(Symbol('Upsilon')) == 'Υ' + assert mpp.doprint(Symbol('Phi')) == 'Φ' + assert mpp.doprint(Symbol('Chi')) == 'Χ' + assert mpp.doprint(Symbol('Psi')) == 'Ψ' + assert mpp.doprint(Symbol('Omega')) == 'Ω' + + +def test_presentation_mathml_order(): + expr = x**3 + x**2*y + 3*x*y**3 + y**4 + + mp = MathMLPresentationPrinter({'order': 'lex'}) + mml = mp._print(expr) + assert mml.childNodes[0].nodeName == 'msup' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '3' + + assert mml.childNodes[6].nodeName == 'msup' + assert mml.childNodes[6].childNodes[0].childNodes[0].nodeValue == 'y' + assert mml.childNodes[6].childNodes[1].childNodes[0].nodeValue == '4' + + mp = MathMLPresentationPrinter({'order': 'rev-lex'}) + mml = mp._print(expr) + + assert mml.childNodes[0].nodeName == 'msup' + assert mml.childNodes[0].childNodes[0].childNodes[0].nodeValue == 'y' + assert mml.childNodes[0].childNodes[1].childNodes[0].nodeValue == '4' + + assert mml.childNodes[6].nodeName == 'msup' + assert mml.childNodes[6].childNodes[0].childNodes[0].nodeValue == 'x' + assert mml.childNodes[6].childNodes[1].childNodes[0].nodeValue == '3' + + +def test_print_intervals(): + a = Symbol('a', real=True) + assert mpp.doprint(Interval(0, a)) == \ + '[0,a]' + assert mpp.doprint(Interval(0, a, False, False)) == \ + '[0,a]' + assert mpp.doprint(Interval(0, a, True, False)) == \ + '(0,a]' + assert mpp.doprint(Interval(0, a, False, True)) == \ + '[0,a)' + assert mpp.doprint(Interval(0, a, True, True)) == \ + '(0,a)' + + +def test_print_tuples(): + assert mpp.doprint(Tuple(0,)) == \ + '(0)' + assert mpp.doprint(Tuple(0, a)) == \ + '(0,a)' + assert mpp.doprint(Tuple(0, a, a)) == \ + '(0,a,a)' + assert mpp.doprint(Tuple(0, 1, 2, 3, 4)) == \ + '(0,1,2,3,4)' + assert mpp.doprint(Tuple(0, 1, Tuple(2, 3, 4))) == \ + '(0,1,(2,3'\ + ',4))' + + +def test_print_re_im(): + assert mpp.doprint(re(x)) == \ + '(x)' + assert mpp.doprint(im(x)) == \ + '(x)' + assert mpp.doprint(re(x + 1, evaluate=False)) == \ + '(x+1)' + assert mpp.doprint(im(x + 1, evaluate=False)) == \ + '(x+1)' + + +def test_print_Abs(): + assert mpp.doprint(Abs(x)) == \ + '|x|' + assert mpp.doprint(Abs(x + 1)) == \ + '|x+1|' + + +def test_print_Determinant(): + assert mpp.doprint(Determinant(Matrix([[1, 2], [3, 4]]))) == \ + '|[1234]|' + + +def test_presentation_settings(): + raises(TypeError, lambda: mathml(x, printer='presentation', + method="garbage")) + + +def test_print_domains(): + from sympy.sets import Integers, Naturals, Naturals0, Reals, Complexes + + assert mpp.doprint(Complexes) == '' + assert mpp.doprint(Integers) == '' + assert mpp.doprint(Naturals) == '' + assert mpp.doprint(Naturals0) == \ + '0' + assert mpp.doprint(Reals) == '' + + +def test_print_expression_with_minus(): + assert mpp.doprint(-x) == '-x' + assert mpp.doprint(-x/y) == \ + '-xy' + assert mpp.doprint(-Rational(1, 2)) == \ + '-12' + + +def test_print_AssocOp(): + from sympy.core.operations import AssocOp + + class TestAssocOp(AssocOp): + identity = 0 + + expr = TestAssocOp(1, 2) + assert mpp.doprint(expr) == \ + 'testassocop12' + + +def test_print_basic(): + expr = Basic(S(1), S(2)) + assert mpp.doprint(expr) == \ + 'basic(1,2)' + assert mp.doprint(expr) == '12' + + +def test_mat_delim_print(): + expr = Matrix([[1, 2], [3, 4]]) + assert mathml(expr, printer='presentation', mat_delim='[') == \ + '[1'\ + '234'\ + ']' + assert mathml(expr, printer='presentation', mat_delim='(') == \ + '(12'\ + '34)' + assert mathml(expr, printer='presentation', mat_delim='') == \ + '12'\ + '34' + + +def test_ln_notation_print(): + expr = log(x) + assert mathml(expr, printer='presentation') == \ + 'log(x)' + assert mathml(expr, printer='presentation', ln_notation=False) == \ + 'log(x)' + assert mathml(expr, printer='presentation', ln_notation=True) == \ + 'ln(x)' + + +def test_mul_symbol_print(): + expr = x * y + assert mathml(expr, printer='presentation') == \ + 'xy' + assert mathml(expr, printer='presentation', mul_symbol=None) == \ + 'xy' + assert mathml(expr, printer='presentation', mul_symbol='dot') == \ + 'x·y' + assert mathml(expr, printer='presentation', mul_symbol='ldot') == \ + 'xy' + assert mathml(expr, printer='presentation', mul_symbol='times') == \ + 'x×y' + + +def test_print_lerchphi(): + assert mpp.doprint(lerchphi(1, 2, 3)) == \ + 'Φ(1,2,3)' + + +def test_print_polylog(): + assert mp.doprint(polylog(x, y)) == \ + 'xy' + assert mpp.doprint(polylog(x, y)) == \ + 'Lix(y)' + + +def test_print_set_frozenset(): + f = frozenset({1, 5, 3}) + assert mpp.doprint(f) == \ + '{1,3,5}' + s = set({1, 2, 3}) + assert mpp.doprint(s) == \ + '{1,2,3}' + + +def test_print_FiniteSet(): + f1 = FiniteSet(x, 1, 3) + assert mpp.doprint(f1) == \ + '{1,3,x}' + + +def test_print_LambertW(): + assert mpp.doprint(LambertW(x)) == 'W(x)' + assert mpp.doprint(LambertW(x, y)) == 'W(x,y)' + + +def test_print_EmptySet(): + assert mpp.doprint(S.EmptySet) == '' + + +def test_print_UniversalSet(): + assert mpp.doprint(S.UniversalSet) == '𝕌' + + +def test_print_spaces(): + assert mpp.doprint(HilbertSpace()) == '' + assert mpp.doprint(ComplexSpace(2)) == '𝒞2' + assert mpp.doprint(FockSpace()) == '' + + +def test_print_constants(): + assert mpp.doprint(hbar) == '' + assert mpp.doprint(S.TribonacciConstant) == 'TribonacciConstant' + assert mpp.doprint(S.GoldenRatio) == 'Φ' + assert mpp.doprint(S.EulerGamma) == 'γ' + + +def test_print_Contains(): + assert mpp.doprint(Contains(x, S.Naturals)) == \ + 'x' + + +def test_print_Dagger(): + x = symbols('x', commutative=False) + assert mpp.doprint(Dagger(x)) == 'x' + + +def test_print_SetOp(): + f1 = FiniteSet(x, 1, 3) + f2 = FiniteSet(y, 2, 4) + + prntr = lambda x: mathml(x, printer='presentation') + + assert prntr(Union(f1, f2, evaluate=False)) == \ + '{1,3,x'\ + '}{2,'\ + '4,y}' + assert prntr(Intersection(f1, f2, evaluate=False)) == \ + '{1,3,x'\ + '}{2'\ + ',4,y}' + assert prntr(Complement(f1, f2, evaluate=False)) == \ + '{1,3,x'\ + '}{2'\ + ',4,y}' + assert prntr(SymmetricDifference(f1, f2, evaluate=False)) == \ + '{1,3,x'\ + '}{2'\ + ',4,y}' + + A = FiniteSet(a) + C = FiniteSet(c) + D = FiniteSet(d) + + U1 = Union(C, D, evaluate=False) + I1 = Intersection(C, D, evaluate=False) + C1 = Complement(C, D, evaluate=False) + D1 = SymmetricDifference(C, D, evaluate=False) + # XXX ProductSet does not support evaluate keyword + P1 = ProductSet(C, D) + + assert prntr(Union(A, I1, evaluate=False)) == \ + '{a}' \ + '({' \ + 'c}{' \ + 'd})' + assert prntr(Intersection(A, C1, evaluate=False)) == \ + '{a}' \ + '({' \ + 'c}{' \ + 'd})' + assert prntr(Complement(A, D1, evaluate=False)) == \ + '{a}' \ + '({' \ + 'c}{' \ + 'd})' + assert prntr(SymmetricDifference(A, P1, evaluate=False)) == \ + '{a}' \ + '({' \ + 'c}×{' \ + 'd})' + assert prntr(ProductSet(A, U1)) == \ + '{a}' \ + '×({' \ + 'c}{' \ + 'd})' + + +def test_print_logic(): + assert mpp.doprint(And(x, y)) == \ + 'xy' + assert mpp.doprint(Or(x, y)) == \ + 'xy' + assert mpp.doprint(Xor(x, y)) == \ + 'xy' + assert mpp.doprint(Implies(x, y)) == \ + 'xy' + assert mpp.doprint(Equivalent(x, y)) == \ + 'xy' + + assert mpp.doprint(And(Eq(x, y), x > 4)) == \ + 'x=y'\ + 'x>4' + assert mpp.doprint(And(Eq(x, 3), y < 3, x > y + 1)) == \ + 'x=3'\ + 'x>y+1'\ + 'y<3' + assert mpp.doprint(Or(Eq(x, y), x > 4)) == \ + 'x=y'\ + 'x>4' + assert mpp.doprint(And(Eq(x, 3), Or(y < 3, x > y + 1))) == \ + 'x=3'\ + '(x>'\ + 'y+1'\ + 'y<3)' + + assert mpp.doprint(Not(x)) == '¬x' + assert mpp.doprint(Not(And(x, y))) == \ + '¬(xy)' + + +def test_root_notation_print(): + assert mathml(x**(S.One/3), printer='presentation') == \ + 'x3' + assert mathml(x**(S.One/3), printer='presentation', root_notation=False) ==\ + 'x13' + assert mathml(x**(S.One/3), printer='content') == \ + '3x' + assert mathml(x**(S.One/3), printer='content', root_notation=False) == \ + 'x13' + assert mathml(x**(Rational(-1, 3)), printer='presentation') == \ + '1x3' + assert mathml(x**(Rational(-1, 3)), printer='presentation', root_notation=False) \ + == '1x13' + + +def test_fold_frac_powers_print(): + expr = x ** Rational(5, 2) + assert mathml(expr, printer='presentation') == \ + 'x52' + assert mathml(expr, printer='presentation', fold_frac_powers=True) == \ + 'x52' + assert mathml(expr, printer='presentation', fold_frac_powers=False) == \ + 'x52' + + +def test_fold_short_frac_print(): + expr = Rational(2, 5) + assert mathml(expr, printer='presentation') == \ + '25' + assert mathml(expr, printer='presentation', fold_short_frac=True) == \ + '25' + assert mathml(expr, printer='presentation', fold_short_frac=False) == \ + '25' + + +def test_print_factorials(): + assert mpp.doprint(factorial(x)) == 'x!' + assert mpp.doprint(factorial(x + 1)) == \ + '(x+1)!' + assert mpp.doprint(factorial2(x)) == 'x!!' + assert mpp.doprint(factorial2(x + 1)) == \ + '(x+1)!!' + assert mpp.doprint(binomial(x, y)) == \ + '(xy)' + assert mpp.doprint(binomial(4, x + y)) == \ + '(4x'\ + '+y)' + + +def test_print_floor(): + expr = floor(x) + assert mathml(expr, printer='presentation') == \ + 'x' + + +def test_print_ceiling(): + expr = ceiling(x) + assert mathml(expr, printer='presentation') == \ + 'x' + + +def test_print_Lambda(): + expr = Lambda(x, x+1) + assert mathml(expr, printer='presentation') == \ + '(xx+1)' + expr = Lambda((x, y), x + y) + assert mathml(expr, printer='presentation') == \ + '((x,y)x+y)' + + +def test_print_conjugate(): + assert mpp.doprint(conjugate(x)) == \ + 'x' + assert mpp.doprint(conjugate(x + 1)) == \ + 'x+1' + + +def test_print_AccumBounds(): + a = Symbol('a', real=True) + assert mpp.doprint(AccumBounds(0, 1)) == '0,1' + assert mpp.doprint(AccumBounds(0, a)) == '0,a' + assert mpp.doprint(AccumBounds(a + 1, a + 2)) == 'a+1,a+2' + + +def test_print_Float(): + assert mpp.doprint(Float(1e100)) == '1.0·10100' + assert mpp.doprint(Float(1e-100)) == '1.0·10-100' + assert mpp.doprint(Float(-1e100)) == '-1.0·10100' + assert mpp.doprint(Float(1.0*oo)) == '' + assert mpp.doprint(Float(-1.0*oo)) == '-' + + +def test_print_different_functions(): + assert mpp.doprint(gamma(x)) == 'Γ(x)' + assert mpp.doprint(lowergamma(x, y)) == 'γ(x,y)' + assert mpp.doprint(uppergamma(x, y)) == 'Γ(x,y)' + assert mpp.doprint(zeta(x)) == 'ζ(x)' + assert mpp.doprint(zeta(x, y)) == 'ζ(x,y)' + assert mpp.doprint(dirichlet_eta(x)) == 'η(x)' + assert mpp.doprint(elliptic_k(x)) == 'Κ(x)' + assert mpp.doprint(totient(x)) == 'ϕ(x)' + assert mpp.doprint(reduced_totient(x)) == 'λ(x)' + assert mpp.doprint(primenu(x)) == 'ν(x)' + assert mpp.doprint(primeomega(x)) == 'Ω(x)' + assert mpp.doprint(fresnels(x)) == 'S(x)' + assert mpp.doprint(fresnelc(x)) == 'C(x)' + assert mpp.doprint(Heaviside(x)) == 'Θ(x,12)' + + +def test_mathml_builtins(): + assert mpp.doprint(None) == 'None' + assert mpp.doprint(true) == 'True' + assert mpp.doprint(false) == 'False' + + +def test_mathml_Range(): + assert mpp.doprint(Range(1, 51)) == \ + '{1,2,,50}' + assert mpp.doprint(Range(1, 4)) == \ + '{1,2,3}' + assert mpp.doprint(Range(0, 3, 1)) == \ + '{0,1,2}' + assert mpp.doprint(Range(0, 30, 1)) == \ + '{0,1,,29}' + assert mpp.doprint(Range(30, 1, -1)) == \ + '{30,29,,2}' + assert mpp.doprint(Range(0, oo, 2)) == \ + '{0,2,}' + assert mpp.doprint(Range(oo, -2, -2)) == \ + '{,2,0}' + assert mpp.doprint(Range(-2, -oo, -1)) == \ + '{-2,-3,}' + + +def test_print_exp(): + assert mpp.doprint(exp(x)) == \ + 'x' + assert mpp.doprint(exp(1) + exp(2)) == \ + '+2' + + +def test_print_MinMax(): + assert mpp.doprint(Min(x, y)) == \ + 'min(x,y)' + assert mpp.doprint(Min(x, 2, x**3)) == \ + 'min(2,x,x3)' + assert mpp.doprint(Max(x, y)) == \ + 'max(x,y)' + assert mpp.doprint(Max(x, 2, x**3)) == \ + 'max(2,x,x3)' + + +def test_mathml_presentation_numbers(): + n = Symbol('n') + assert mathml(catalan(n), printer='presentation') == \ + 'Cn' + assert mathml(bernoulli(n), printer='presentation') == \ + 'Bn' + assert mathml(bell(n), printer='presentation') == \ + 'Bn' + assert mathml(euler(n), printer='presentation') == \ + 'En' + assert mathml(fibonacci(n), printer='presentation') == \ + 'Fn' + assert mathml(lucas(n), printer='presentation') == \ + 'Ln' + assert mathml(tribonacci(n), printer='presentation') == \ + 'Tn' + assert mathml(bernoulli(n, x), printer='presentation') == \ + mathml(bell(n, x), printer='presentation') == \ + 'Bn(x)' + assert mathml(euler(n, x), printer='presentation') == \ + 'En(x)' + assert mathml(fibonacci(n, x), printer='presentation') == \ + 'Fn(x)' + assert mathml(tribonacci(n, x), printer='presentation') == \ + 'Tn(x)' + + +def test_mathml_presentation_mathieu(): + assert mathml(mathieuc(x, y, z), printer='presentation') == \ + 'C(x,y,z)' + assert mathml(mathieus(x, y, z), printer='presentation') == \ + 'S(x,y,z)' + assert mathml(mathieucprime(x, y, z), printer='presentation') == \ + 'C′(x,y,z)' + assert mathml(mathieusprime(x, y, z), printer='presentation') == \ + 'S′(x,y,z)' + + +def test_mathml_presentation_stieltjes(): + assert mathml(stieltjes(n), printer='presentation') == \ + 'γn' + assert mathml(stieltjes(n, x), printer='presentation') == \ + 'γn(x)' + + +def test_print_matrix_symbol(): + A = MatrixSymbol('A', 1, 2) + assert mpp.doprint(A) == 'A' + assert mp.doprint(A) == 'A' + assert mathml(A, printer='presentation', mat_symbol_style="bold") == \ + 'A' + # No effect in content printer + assert mathml(A, mat_symbol_style="bold") == 'A' + + +def test_print_hadamard(): + from sympy.matrices.expressions import HadamardProduct + from sympy.matrices.expressions import Transpose + + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + + assert mathml(HadamardProduct(X, Y*Y), printer="presentation") == \ + '' \ + 'X' \ + '' \ + 'Y2' \ + '' + + assert mathml(HadamardProduct(X, Y)*Y, printer="presentation") == \ + '' \ + '(' \ + 'XY' \ + ')' \ + 'Y' \ + '' + + assert mathml(HadamardProduct(X, Y, Y), printer="presentation") == \ + '' \ + 'X' \ + 'Y' \ + 'Y' \ + '' + + assert mathml( + Transpose(HadamardProduct(X, Y)), printer="presentation") == \ + '' \ + '(' \ + 'XY' \ + ')' \ + 'T' \ + '' + + +def test_print_random_symbol(): + R = RandomSymbol(Symbol('R')) + assert mpp.doprint(R) == 'R' + assert mp.doprint(R) == 'R' + + +def test_print_IndexedBase(): + assert mathml(IndexedBase(a)[b], printer='presentation') == \ + 'ab' + assert mathml(IndexedBase(a)[b, c, d], printer='presentation') == \ + 'a(b,c,d)' + assert mathml(IndexedBase(a)[b]*IndexedBase(c)[d]*IndexedBase(e), + printer='presentation') == \ + 'ab⁢'\ + 'cde' + + +def test_print_Indexed(): + assert mathml(IndexedBase(a), printer='presentation') == 'a' + assert mathml(IndexedBase(a/b), printer='presentation') == \ + 'ab' + assert mathml(IndexedBase((a, b)), printer='presentation') == \ + '(a,b)' + +def test_print_MatrixElement(): + i, j = symbols('i j') + A = MatrixSymbol('A', i, j) + assert mathml(A[0,0],printer = 'presentation') == \ + 'A0,0' + assert mathml(A[i,j], printer = 'presentation') == \ + 'Ai,j' + assert mathml(A[i*j,0], printer = 'presentation') == \ + 'Aij,0' + + +def test_print_Vector(): + ACS = CoordSys3D('A') + assert mathml(Cross(ACS.i, ACS.j*ACS.x*3 + ACS.k), printer='presentation') == \ + 'i^'\ + 'A×('\ + '(3'\ + 'xA'\ + ')'\ + 'j^'\ + 'A+'\ + 'k^'\ + 'A)' + assert mathml(Cross(ACS.i, ACS.j), printer='presentation') == \ + 'i^'\ + 'A×'\ + 'j^'\ + 'A' + assert mathml(x*Cross(ACS.i, ACS.j), printer='presentation') == \ + 'x('\ + 'i^'\ + 'A×'\ + 'j^'\ + 'A)' + assert mathml(Cross(x*ACS.i, ACS.j), printer='presentation') == \ + '-j'\ + '^A'\ + '×((x)'\ + 'i'\ + '^A'\ + ')' + assert mathml(Curl(3*ACS.x*ACS.j), printer='presentation') == \ + '×(('\ + '3x'\ + 'A)'\ + 'j^'\ + 'A)' + assert mathml(Curl(3*x*ACS.x*ACS.j), printer='presentation') == \ + '×(('\ + '3x'\ + 'A'\ + 'x)'\ + 'j^'\ + 'A)' + assert mathml(x*Curl(3*ACS.x*ACS.j), printer='presentation') == \ + 'x('\ + '×((3'\ + 'x'\ + 'A)'\ + 'j'\ + '^A)'\ + ')' + assert mathml(Curl(3*x*ACS.x*ACS.j + ACS.i), printer='presentation') == \ + '×('\ + 'i^'\ + 'A+('\ + '3x'\ + 'A'\ + 'x)'\ + 'j^'\ + 'A)' + assert mathml(Divergence(3*ACS.x*ACS.j), printer='presentation') == \ + '·(('\ + '3x'\ + 'A)'\ + 'j'\ + '^A)' + assert mathml(x*Divergence(3*ACS.x*ACS.j), printer='presentation') == \ + 'x('\ + '·((3'\ + 'x'\ + 'A)'\ + 'j'\ + '^A'\ + '))' + assert mathml(Divergence(3*x*ACS.x*ACS.j + ACS.i), printer='presentation') == \ + '·('\ + 'i^'\ + 'A+('\ + '3'\ + 'xA'\ + 'x)'\ + 'j'\ + '^A'\ + ')' + assert mathml(Dot(ACS.i, ACS.j*ACS.x*3+ACS.k), printer='presentation') == \ + 'i^'\ + 'A·('\ + '(3'\ + 'xA'\ + ')'\ + 'j^'\ + 'A+'\ + 'k^'\ + 'A)' + assert mathml(Dot(ACS.i, ACS.j), printer='presentation') == \ + 'i^'\ + 'A·'\ + 'j^'\ + 'A' + assert mathml(Dot(x*ACS.i, ACS.j), printer='presentation') == \ + 'j^'\ + 'A·('\ + '(x)'\ + 'i^'\ + 'A)' + assert mathml(x*Dot(ACS.i, ACS.j), printer='presentation') == \ + 'x('\ + 'i^'\ + 'A·'\ + 'j^'\ + 'A)' + assert mathml(Gradient(ACS.x), printer='presentation') == \ + 'x'\ + 'A' + assert mathml(Gradient(ACS.x + 3*ACS.y), printer='presentation') == \ + '('\ + 'xA+3'\ + 'y'\ + 'A)' + assert mathml(x*Gradient(ACS.x), printer='presentation') == \ + 'x('\ + 'xA'\ + ')' + assert mathml(Gradient(x*ACS.x), printer='presentation') == \ + '('\ + 'xA'\ + 'x)' + assert mathml(Cross(ACS.z, ACS.x), printer='presentation') == \ + '-x'\ + 'A×'\ + 'zA' + assert mathml(Laplacian(ACS.x), printer='presentation') == \ + 'x'\ + 'A' + assert mathml(Laplacian(ACS.x + 3*ACS.y), printer='presentation') == \ + '('\ + 'xA+3'\ + 'y'\ + 'A)' + assert mathml(x*Laplacian(ACS.x), printer='presentation') == \ + 'x('\ + 'xA'\ + ')' + assert mathml(Laplacian(x*ACS.x), printer='presentation') == \ + '('\ + 'xA'\ + 'x)' + +@XFAIL +def test_vector_cross_xfail(): + ACS = CoordSys3D('A') + assert mathml(Cross(ACS.x, ACS.z) + Cross(ACS.z, ACS.x), printer='presentation') == \ + '0^' + +def test_print_elliptic_f(): + assert mathml(elliptic_f(x, y), printer = 'presentation') == \ + '𝖥(x|y)' + assert mathml(elliptic_f(x/y, y), printer = 'presentation') == \ + '𝖥(xy|y)' + +def test_print_elliptic_e(): + assert mathml(elliptic_e(x), printer = 'presentation') == \ + '𝖤(x)' + assert mathml(elliptic_e(x, y), printer = 'presentation') == \ + '𝖤(x|y)' + +def test_print_elliptic_pi(): + assert mathml(elliptic_pi(x, y), printer = 'presentation') == \ + '𝛱(x|y)' + assert mathml(elliptic_pi(x, y, z), printer = 'presentation') == \ + '𝛱(x;y|z)' + +def test_print_Ei(): + assert mathml(Ei(x), printer = 'presentation') == \ + 'Ei(x)' + assert mathml(Ei(x**y), printer = 'presentation') == \ + 'Ei(xy)' + +def test_print_expint(): + assert mathml(expint(x, y), printer = 'presentation') == \ + 'Ex(y)' + assert mathml(expint(IndexedBase(x)[1], IndexedBase(x)[2]), printer = 'presentation') == \ + 'Ex1(x2)' + +def test_print_jacobi(): + assert mathml(jacobi(n, a, b, x), printer = 'presentation') == \ + 'Pn(a,b)(x)' + +def test_print_gegenbauer(): + assert mathml(gegenbauer(n, a, x), printer = 'presentation') == \ + 'Cn(a)(x)' + +def test_print_chebyshevt(): + assert mathml(chebyshevt(n, x), printer = 'presentation') == \ + 'Tn(x)' + +def test_print_chebyshevu(): + assert mathml(chebyshevu(n, x), printer = 'presentation') == \ + 'Un(x)' + +def test_print_legendre(): + assert mathml(legendre(n, x), printer = 'presentation') == \ + 'Pn(x)' + +def test_print_assoc_legendre(): + assert mathml(assoc_legendre(n, a, x), printer = 'presentation') == \ + 'Pn(a)(x)' + +def test_print_laguerre(): + assert mathml(laguerre(n, x), printer = 'presentation') == \ + 'Ln(x)' + +def test_print_assoc_laguerre(): + assert mathml(assoc_laguerre(n, a, x), printer = 'presentation') == \ + 'Ln(a)(x)' + +def test_print_hermite(): + assert mathml(hermite(n, x), printer = 'presentation') == \ + 'Hn(x)' + +def test_mathml_SingularityFunction(): + assert mathml(SingularityFunction(x, 4, 5), printer='presentation') == \ + 'x-45' + assert mathml(SingularityFunction(x, -3, 4), printer='presentation') == \ + 'x+34' + assert mathml(SingularityFunction(x, 0, 4), printer='presentation') == \ + 'x4' + assert mathml(SingularityFunction(x, a, n), printer='presentation') == \ + '-a+xn' + assert mathml(SingularityFunction(x, 4, -2), printer='presentation') == \ + 'x-4-2' + assert mathml(SingularityFunction(x, 4, -1), printer='presentation') == \ + 'x-4-1' + + +def test_mathml_matrix_functions(): + from sympy.matrices import Adjoint, Inverse, Transpose + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + assert mathml(Adjoint(X), printer='presentation') == \ + 'X' + assert mathml(Adjoint(X + Y), printer='presentation') == \ + '(X+Y)' + assert mathml(Adjoint(X) + Adjoint(Y), printer='presentation') == \ + 'X+' \ + 'Y' + assert mathml(Adjoint(X*Y), printer='presentation') == \ + '(X' \ + 'Y)' + assert mathml(Adjoint(Y)*Adjoint(X), printer='presentation') == \ + 'Y⁢' \ + 'X' + assert mathml(Adjoint(X**2), printer='presentation') == \ + '(X2)' + assert mathml(Adjoint(X)**2, printer='presentation') == \ + '(X)2' + assert mathml(Adjoint(Inverse(X)), printer='presentation') == \ + '(X-1)' + assert mathml(Inverse(Adjoint(X)), printer='presentation') == \ + '(X)-1' + assert mathml(Adjoint(Transpose(X)), printer='presentation') == \ + '(XT)' + assert mathml(Transpose(Adjoint(X)), printer='presentation') == \ + '(X)T' + assert mathml(Transpose(Adjoint(X) + Y), printer='presentation') == \ + '(X' \ + '+Y)T' + assert mathml(Transpose(X), printer='presentation') == \ + 'XT' + assert mathml(Transpose(X + Y), printer='presentation') == \ + '(X+Y)T' + + +def test_mathml_special_matrices(): + from sympy.matrices import Identity, ZeroMatrix, OneMatrix + assert mathml(Identity(4), printer='presentation') == '𝕀' + assert mathml(ZeroMatrix(2, 2), printer='presentation') == '𝟘' + assert mathml(OneMatrix(2, 2), printer='presentation') == '𝟙' + +def test_mathml_piecewise(): + from sympy.functions.elementary.piecewise import Piecewise + # Content MathML + assert mathml(Piecewise((x, x <= 1), (x**2, True))) == \ + 'xx1x2' + + raises(ValueError, lambda: mathml(Piecewise((x, x <= 1)))) + + +def test_issue_17857(): + assert mathml(Range(-oo, oo), printer='presentation') == \ + '{,-1,0,1,}' + assert mathml(Range(oo, -oo, -1), printer='presentation') == \ + '{,1,0,-1,}' + + +def test_float_roundtrip(): + x = sympify(0.8975979010256552) + y = float(mp.doprint(x).strip('')) + assert x == y + + +def test_content_mathml_disable_split_super_sub(): + mp = MathMLContentPrinter() + assert mp.doprint(Symbol('u_b')) == 'ub' + mp = MathMLContentPrinter({'disable_split_super_sub': False}) + assert mp.doprint(Symbol('u_b')) == 'ub' + mp = MathMLContentPrinter({'disable_split_super_sub': True}) + assert mp.doprint(Symbol('u_b')) == 'u_b' + +def test_presentation_mathml_disable_split_super_sub(): + mpp = MathMLPresentationPrinter() + assert mpp.doprint(Symbol('u_b')) == 'ub' + mpp = MathMLPresentationPrinter({'disable_split_super_sub': False}) + assert mpp.doprint(Symbol('u_b')) == 'ub' + mpp = MathMLPresentationPrinter({'disable_split_super_sub': True}) + assert mpp.doprint(Symbol('u_b')) == 'u_b' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_numpy.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_numpy.py new file mode 100644 index 0000000000000000000000000000000000000000..fee1c6bd95e54790a048220f37b8e5de79017d2f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_numpy.py @@ -0,0 +1,381 @@ +from sympy.concrete.summations import Sum +from sympy.core.mod import Mod +from sympy.core.relational import (Equality, Unequality) +from sympy.core.symbol import Symbol +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.gamma_functions import polygamma +from sympy.functions.special.error_functions import (Si, Ci) +from sympy.matrices import Matrix +from sympy.matrices.expressions.blockmatrix import BlockMatrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.special import Identity +from sympy.utilities.lambdify import lambdify +from sympy import symbols, Min, Max + +from sympy.abc import x, i, j, a, b, c, d +from sympy.core import Pow +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.codegen.numpy_nodes import logaddexp, logaddexp2 +from sympy.codegen.cfunctions import log1p, expm1, hypot, log10, exp2, log2, Sqrt +from sympy.tensor.array import Array +from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct, ArrayAdd, \ + PermuteDims, ArrayDiagonal +from sympy.printing.numpy import NumPyPrinter, SciPyPrinter, _numpy_known_constants, \ + _numpy_known_functions, _scipy_known_constants, _scipy_known_functions +from sympy.tensor.array.expressions.from_matrix_to_array import convert_matrix_to_array + +from sympy.testing.pytest import skip, raises +from sympy.external import import_module + +np = import_module('numpy') +jax = import_module('jax') + +if np: + deafult_float_info = np.finfo(np.array([]).dtype) + NUMPY_DEFAULT_EPSILON = deafult_float_info.eps + +def test_numpy_piecewise_regression(): + """ + NumPyPrinter needs to print Piecewise()'s choicelist as a list to avoid + breaking compatibility with numpy 1.8. This is not necessary in numpy 1.9+. + See gh-9747 and gh-9749 for details. + """ + printer = NumPyPrinter() + p = Piecewise((1, x < 0), (0, True)) + assert printer.doprint(p) == \ + 'numpy.select([numpy.less(x, 0),True], [1,0], default=numpy.nan)' + assert printer.module_imports == {'numpy': {'select', 'less', 'nan'}} + +def test_numpy_logaddexp(): + lae = logaddexp(a, b) + assert NumPyPrinter().doprint(lae) == 'numpy.logaddexp(a, b)' + lae2 = logaddexp2(a, b) + assert NumPyPrinter().doprint(lae2) == 'numpy.logaddexp2(a, b)' + + +def test_sum(): + if not np: + skip("NumPy not installed") + + s = Sum(x ** i, (i, a, b)) + f = lambdify((a, b, x), s, 'numpy') + + a_, b_ = 0, 10 + x_ = np.linspace(-1, +1, 10) + assert np.allclose(f(a_, b_, x_), sum(x_ ** i_ for i_ in range(a_, b_ + 1))) + + s = Sum(i * x, (i, a, b)) + f = lambdify((a, b, x), s, 'numpy') + + a_, b_ = 0, 10 + x_ = np.linspace(-1, +1, 10) + assert np.allclose(f(a_, b_, x_), sum(i_ * x_ for i_ in range(a_, b_ + 1))) + + +def test_multiple_sums(): + if not np: + skip("NumPy not installed") + + s = Sum((x + j) * i, (i, a, b), (j, c, d)) + f = lambdify((a, b, c, d, x), s, 'numpy') + + a_, b_ = 0, 10 + c_, d_ = 11, 21 + x_ = np.linspace(-1, +1, 10) + assert np.allclose(f(a_, b_, c_, d_, x_), + sum((x_ + j_) * i_ for i_ in range(a_, b_ + 1) for j_ in range(c_, d_ + 1))) + + +def test_codegen_einsum(): + if not np: + skip("NumPy not installed") + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + + cg = convert_matrix_to_array(M * N) + f = lambdify((M, N), cg, 'numpy') + + ma = np.array([[1, 2], [3, 4]]) + mb = np.array([[1,-2], [-1, 3]]) + assert (f(ma, mb) == np.matmul(ma, mb)).all() + + +def test_codegen_extra(): + if not np: + skip("NumPy not installed") + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + P = MatrixSymbol("P", 2, 2) + Q = MatrixSymbol("Q", 2, 2) + ma = np.array([[1, 2], [3, 4]]) + mb = np.array([[1,-2], [-1, 3]]) + mc = np.array([[2, 0], [1, 2]]) + md = np.array([[1,-1], [4, 7]]) + + cg = ArrayTensorProduct(M, N) + f = lambdify((M, N), cg, 'numpy') + assert (f(ma, mb) == np.einsum(ma, [0, 1], mb, [2, 3])).all() + + cg = ArrayAdd(M, N) + f = lambdify((M, N), cg, 'numpy') + assert (f(ma, mb) == ma+mb).all() + + cg = ArrayAdd(M, N, P) + f = lambdify((M, N, P), cg, 'numpy') + assert (f(ma, mb, mc) == ma+mb+mc).all() + + cg = ArrayAdd(M, N, P, Q) + f = lambdify((M, N, P, Q), cg, 'numpy') + assert (f(ma, mb, mc, md) == ma+mb+mc+md).all() + + cg = PermuteDims(M, [1, 0]) + f = lambdify((M,), cg, 'numpy') + assert (f(ma) == ma.T).all() + + cg = PermuteDims(ArrayTensorProduct(M, N), [1, 2, 3, 0]) + f = lambdify((M, N), cg, 'numpy') + assert (f(ma, mb) == np.transpose(np.einsum(ma, [0, 1], mb, [2, 3]), (1, 2, 3, 0))).all() + + cg = ArrayDiagonal(ArrayTensorProduct(M, N), (1, 2)) + f = lambdify((M, N), cg, 'numpy') + assert (f(ma, mb) == np.diagonal(np.einsum(ma, [0, 1], mb, [2, 3]), axis1=1, axis2=2)).all() + + +def test_relational(): + if not np: + skip("NumPy not installed") + + e = Equality(x, 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [False, True, False]) + + e = Unequality(x, 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [True, False, True]) + + e = (x < 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [True, False, False]) + + e = (x <= 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [True, True, False]) + + e = (x > 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [False, False, True]) + + e = (x >= 1) + + f = lambdify((x,), e) + x_ = np.array([0, 1, 2]) + assert np.array_equal(f(x_), [False, True, True]) + + +def test_mod(): + if not np: + skip("NumPy not installed") + + e = Mod(a, b) + f = lambdify((a, b), e) + + a_ = np.array([0, 1, 2, 3]) + b_ = 2 + assert np.array_equal(f(a_, b_), [0, 1, 0, 1]) + + a_ = np.array([0, 1, 2, 3]) + b_ = np.array([2, 2, 2, 2]) + assert np.array_equal(f(a_, b_), [0, 1, 0, 1]) + + a_ = np.array([2, 3, 4, 5]) + b_ = np.array([2, 3, 4, 5]) + assert np.array_equal(f(a_, b_), [0, 0, 0, 0]) + + +def test_pow(): + if not np: + skip('NumPy not installed') + + expr = Pow(2, -1, evaluate=False) + f = lambdify([], expr, 'numpy') + assert f() == 0.5 + + +def test_expm1(): + if not np: + skip("NumPy not installed") + + f = lambdify((a,), expm1(a), 'numpy') + assert abs(f(1e-10) - 1e-10 - 5e-21) <= 1e-10 * NUMPY_DEFAULT_EPSILON + + +def test_log1p(): + if not np: + skip("NumPy not installed") + + f = lambdify((a,), log1p(a), 'numpy') + assert abs(f(1e-99) - 1e-99) <= 1e-99 * NUMPY_DEFAULT_EPSILON + +def test_hypot(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a, b), hypot(a, b), 'numpy')(3, 4) - 5) <= NUMPY_DEFAULT_EPSILON + +def test_log10(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a,), log10(a), 'numpy')(100) - 2) <= NUMPY_DEFAULT_EPSILON + + +def test_exp2(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a,), exp2(a), 'numpy')(5) - 32) <= NUMPY_DEFAULT_EPSILON + + +def test_log2(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a,), log2(a), 'numpy')(256) - 8) <= NUMPY_DEFAULT_EPSILON + + +def test_Sqrt(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a,), Sqrt(a), 'numpy')(4) - 2) <= NUMPY_DEFAULT_EPSILON + + +def test_sqrt(): + if not np: + skip("NumPy not installed") + assert abs(lambdify((a,), sqrt(a), 'numpy')(4) - 2) <= NUMPY_DEFAULT_EPSILON + + +def test_matsolve(): + if not np: + skip("NumPy not installed") + + M = MatrixSymbol("M", 3, 3) + x = MatrixSymbol("x", 3, 1) + + expr = M**(-1) * x + x + matsolve_expr = MatrixSolve(M, x) + x + + f = lambdify((M, x), expr) + f_matsolve = lambdify((M, x), matsolve_expr) + + m0 = np.array([[1, 2, 3], [3, 2, 5], [5, 6, 7]]) + assert np.linalg.matrix_rank(m0) == 3 + + x0 = np.array([3, 4, 5]) + + assert np.allclose(f_matsolve(m0, x0), f(m0, x0)) + + +def test_16857(): + if not np: + skip("NumPy not installed") + + a_1 = MatrixSymbol('a_1', 10, 3) + a_2 = MatrixSymbol('a_2', 10, 3) + a_3 = MatrixSymbol('a_3', 10, 3) + a_4 = MatrixSymbol('a_4', 10, 3) + A = BlockMatrix([[a_1, a_2], [a_3, a_4]]) + assert A.shape == (20, 6) + + printer = NumPyPrinter() + assert printer.doprint(A) == 'numpy.block([[a_1, a_2], [a_3, a_4]])' + + +def test_issue_17006(): + if not np: + skip("NumPy not installed") + + M = MatrixSymbol("M", 2, 2) + + f = lambdify(M, M + Identity(2)) + ma = np.array([[1, 2], [3, 4]]) + mr = np.array([[2, 2], [3, 5]]) + + assert (f(ma) == mr).all() + + from sympy.core.symbol import symbols + n = symbols('n', integer=True) + N = MatrixSymbol("M", n, n) + raises(NotImplementedError, lambda: lambdify(N, N + Identity(n))) + +def test_jax_tuple_compatibility(): + if not jax: + skip("Jax not installed") + + x, y, z = symbols('x y z') + expr = Max(x, y, z) + Min(x, y, z) + func = lambdify((x, y, z), expr, 'jax') + input_tuple1, input_tuple2 = (1, 2, 3), (4, 5, 6) + input_array1, input_array2 = jax.numpy.asarray(input_tuple1), jax.numpy.asarray(input_tuple2) + assert np.allclose(func(*input_tuple1), func(*input_array1)) + assert np.allclose(func(*input_tuple2), func(*input_array2)) + +def test_numpy_array(): + p = NumPyPrinter() + assert p.doprint(Array([[1, 2], [3, 5]])) == 'numpy.array([[1, 2], [3, 5]])' + assert p.doprint(Array([1, 2])) == 'numpy.array([1, 2])' + assert p.doprint(Array([[[1, 2, 3]]])) == 'numpy.array([[[1, 2, 3]]])' + assert p.doprint(Array([], (0,))) == 'numpy.zeros((0,))' + assert p.doprint(Array([], (0, 0))) == 'numpy.zeros((0, 0))' + assert p.doprint(Array([], (0, 1))) == 'numpy.zeros((0, 1))' + assert p.doprint(Array([], (1, 0))) == 'numpy.zeros((1, 0))' + assert p.doprint(Array([1], ())) == 'numpy.array(1)' + +def test_numpy_matrix(): + p = NumPyPrinter() + assert p.doprint(Matrix([[1, 2], [3, 5]])) == 'numpy.array([[1, 2], [3, 5]])' + assert p.doprint(Matrix([1, 2])) == 'numpy.array([[1], [2]])' + assert p.doprint(Matrix(0, 0, [])) == 'numpy.zeros((0, 0))' + assert p.doprint(Matrix(0, 1, [])) == 'numpy.zeros((0, 1))' + assert p.doprint(Matrix(1, 0, [])) == 'numpy.zeros((1, 0))' + +def test_numpy_known_funcs_consts(): + assert _numpy_known_constants['NaN'] == 'numpy.nan' + assert _numpy_known_constants['EulerGamma'] == 'numpy.euler_gamma' + + assert _numpy_known_functions['acos'] == 'numpy.arccos' + assert _numpy_known_functions['log'] == 'numpy.log' + +def test_scipy_known_funcs_consts(): + assert _scipy_known_constants['GoldenRatio'] == 'scipy.constants.golden_ratio' + assert _scipy_known_constants['Pi'] == 'scipy.constants.pi' + + assert _scipy_known_functions['erf'] == 'scipy.special.erf' + assert _scipy_known_functions['factorial'] == 'scipy.special.factorial' + +def test_numpy_print_methods(): + prntr = NumPyPrinter() + assert hasattr(prntr, '_print_acos') + assert hasattr(prntr, '_print_log') + +def test_scipy_print_methods(): + prntr = SciPyPrinter() + assert hasattr(prntr, '_print_acos') + assert hasattr(prntr, '_print_log') + assert hasattr(prntr, '_print_erf') + assert hasattr(prntr, '_print_factorial') + assert hasattr(prntr, '_print_chebyshevt') + k = Symbol('k', integer=True, nonnegative=True) + x = Symbol('x', real=True) + assert prntr.doprint(polygamma(k, x)) == "scipy.special.polygamma(k, x)" + assert prntr.doprint(Si(x)) == "scipy.special.sici(x)[0]" + assert prntr.doprint(Ci(x)) == "scipy.special.sici(x)[1]" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_octave.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_octave.py new file mode 100644 index 0000000000000000000000000000000000000000..1aba318f873c48ec702f1b4e3a6cc047f75d647d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_octave.py @@ -0,0 +1,515 @@ +from sympy.core import (S, pi, oo, symbols, Function, Rational, Integer, + Tuple, Symbol, EulerGamma, GoldenRatio, Catalan, + Lambda, Mul, Pow, Mod, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.functions import (arg, atan2, bernoulli, beta, ceiling, chebyshevu, + chebyshevt, conjugate, DiracDelta, exp, expint, + factorial, floor, harmonic, Heaviside, im, + laguerre, LambertW, log, Max, Min, Piecewise, + polylog, re, RisingFactorial, sign, sinc, sqrt, + zeta, binomial, legendre, dirichlet_eta, + riemann_xi) +from sympy.functions import (sin, cos, tan, cot, sec, csc, asin, acos, acot, + atan, asec, acsc, sinh, cosh, tanh, coth, csch, + sech, asinh, acosh, atanh, acoth, asech, acsch) +from sympy.testing.pytest import raises, XFAIL +from sympy.utilities.lambdify import implemented_function +from sympy.matrices import (eye, Matrix, MatrixSymbol, Identity, + HadamardProduct, SparseMatrix, HadamardPower) +from sympy.functions.special.bessel import (jn, yn, besselj, bessely, besseli, + besselk, hankel1, hankel2, airyai, + airybi, airyaiprime, airybiprime) +from sympy.functions.special.gamma_functions import (gamma, lowergamma, + uppergamma, loggamma, + polygamma) +from sympy.functions.special.error_functions import (Chi, Ci, erf, erfc, erfi, + erfcinv, erfinv, fresnelc, + fresnels, li, Shi, Si, Li, + erf2, Ei) +from sympy.printing.octave import octave_code, octave_code as mcode + +x, y, z = symbols('x,y,z') + + +def test_Integer(): + assert mcode(Integer(67)) == "67" + assert mcode(Integer(-1)) == "-1" + + +def test_Rational(): + assert mcode(Rational(3, 7)) == "3/7" + assert mcode(Rational(18, 9)) == "2" + assert mcode(Rational(3, -7)) == "-3/7" + assert mcode(Rational(-3, -7)) == "3/7" + assert mcode(x + Rational(3, 7)) == "x + 3/7" + assert mcode(Rational(3, 7)*x) == "3*x/7" + + +def test_Relational(): + assert mcode(Eq(x, y)) == "x == y" + assert mcode(Ne(x, y)) == "x != y" + assert mcode(Le(x, y)) == "x <= y" + assert mcode(Lt(x, y)) == "x < y" + assert mcode(Gt(x, y)) == "x > y" + assert mcode(Ge(x, y)) == "x >= y" + + +def test_Function(): + assert mcode(sin(x) ** cos(x)) == "sin(x).^cos(x)" + assert mcode(sign(x)) == "sign(x)" + assert mcode(exp(x)) == "exp(x)" + assert mcode(log(x)) == "log(x)" + assert mcode(factorial(x)) == "factorial(x)" + assert mcode(floor(x)) == "floor(x)" + assert mcode(atan2(y, x)) == "atan2(y, x)" + assert mcode(beta(x, y)) == 'beta(x, y)' + assert mcode(polylog(x, y)) == 'polylog(x, y)' + assert mcode(harmonic(x)) == 'harmonic(x)' + assert mcode(bernoulli(x)) == "bernoulli(x)" + assert mcode(bernoulli(x, y)) == "bernoulli(x, y)" + assert mcode(legendre(x, y)) == "legendre(x, y)" + + +def test_Function_change_name(): + assert mcode(abs(x)) == "abs(x)" + assert mcode(ceiling(x)) == "ceil(x)" + assert mcode(arg(x)) == "angle(x)" + assert mcode(im(x)) == "imag(x)" + assert mcode(re(x)) == "real(x)" + assert mcode(conjugate(x)) == "conj(x)" + assert mcode(chebyshevt(y, x)) == "chebyshevT(y, x)" + assert mcode(chebyshevu(y, x)) == "chebyshevU(y, x)" + assert mcode(laguerre(x, y)) == "laguerreL(x, y)" + assert mcode(Chi(x)) == "coshint(x)" + assert mcode(Shi(x)) == "sinhint(x)" + assert mcode(Ci(x)) == "cosint(x)" + assert mcode(Si(x)) == "sinint(x)" + assert mcode(li(x)) == "logint(x)" + assert mcode(loggamma(x)) == "gammaln(x)" + assert mcode(polygamma(x, y)) == "psi(x, y)" + assert mcode(RisingFactorial(x, y)) == "pochhammer(x, y)" + assert mcode(DiracDelta(x)) == "dirac(x)" + assert mcode(DiracDelta(x, 3)) == "dirac(3, x)" + assert mcode(Heaviside(x)) == "heaviside(x, 1/2)" + assert mcode(Heaviside(x, y)) == "heaviside(x, y)" + assert mcode(binomial(x, y)) == "bincoeff(x, y)" + assert mcode(Mod(x, y)) == "mod(x, y)" + + +def test_minmax(): + assert mcode(Max(x, y) + Min(x, y)) == "max(x, y) + min(x, y)" + assert mcode(Max(x, y, z)) == "max(x, max(y, z))" + assert mcode(Min(x, y, z)) == "min(x, min(y, z))" + + +def test_Pow(): + assert mcode(x**3) == "x.^3" + assert mcode(x**(y**3)) == "x.^(y.^3)" + assert mcode(x**Rational(2, 3)) == 'x.^(2/3)' + g = implemented_function('g', Lambda(x, 2*x)) + assert mcode(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "(3.5*2*x).^(-x + y.^x)./(x.^2 + y)" + # For issue 14160 + assert mcode(Mul(-2, x, Pow(Mul(y,y,evaluate=False), -1, evaluate=False), + evaluate=False)) == '-2*x./(y.*y)' + + +def test_basic_ops(): + assert mcode(x*y) == "x.*y" + assert mcode(x + y) == "x + y" + assert mcode(x - y) == "x - y" + assert mcode(-x) == "-x" + + +def test_1_over_x_and_sqrt(): + # 1.0 and 0.5 would do something different in regular StrPrinter, + # but these are exact in IEEE floating point so no different here. + assert mcode(1/x) == '1./x' + assert mcode(x**-1) == mcode(x**-1.0) == '1./x' + assert mcode(1/sqrt(x)) == '1./sqrt(x)' + assert mcode(x**-S.Half) == mcode(x**-0.5) == '1./sqrt(x)' + assert mcode(sqrt(x)) == 'sqrt(x)' + assert mcode(x**S.Half) == mcode(x**0.5) == 'sqrt(x)' + assert mcode(1/pi) == '1/pi' + assert mcode(pi**-1) == mcode(pi**-1.0) == '1/pi' + assert mcode(pi**-0.5) == '1/sqrt(pi)' + + +def test_mix_number_mult_symbols(): + assert mcode(3*x) == "3*x" + assert mcode(pi*x) == "pi*x" + assert mcode(3/x) == "3./x" + assert mcode(pi/x) == "pi./x" + assert mcode(x/3) == "x/3" + assert mcode(x/pi) == "x/pi" + assert mcode(x*y) == "x.*y" + assert mcode(3*x*y) == "3*x.*y" + assert mcode(3*pi*x*y) == "3*pi*x.*y" + assert mcode(x/y) == "x./y" + assert mcode(3*x/y) == "3*x./y" + assert mcode(x*y/z) == "x.*y./z" + assert mcode(x/y*z) == "x.*z./y" + assert mcode(1/x/y) == "1./(x.*y)" + assert mcode(2*pi*x/y/z) == "2*pi*x./(y.*z)" + assert mcode(3*pi/x) == "3*pi./x" + assert mcode(S(3)/5) == "3/5" + assert mcode(S(3)/5*x) == "3*x/5" + assert mcode(x/y/z) == "x./(y.*z)" + assert mcode((x+y)/z) == "(x + y)./z" + assert mcode((x+y)/(z+x)) == "(x + y)./(x + z)" + assert mcode((x+y)/EulerGamma) == "(x + y)/%s" % EulerGamma.evalf(17) + assert mcode(x/3/pi) == "x/(3*pi)" + assert mcode(S(3)/5*x*y/pi) == "3*x.*y/(5*pi)" + + +def test_mix_number_pow_symbols(): + assert mcode(pi**3) == 'pi^3' + assert mcode(x**2) == 'x.^2' + assert mcode(x**(pi**3)) == 'x.^(pi^3)' + assert mcode(x**y) == 'x.^y' + assert mcode(x**(y**z)) == 'x.^(y.^z)' + assert mcode((x**y)**z) == '(x.^y).^z' + + +def test_imag(): + I = S('I') + assert mcode(I) == "1i" + assert mcode(5*I) == "5i" + assert mcode((S(3)/2)*I) == "3*1i/2" + assert mcode(3+4*I) == "3 + 4i" + assert mcode(sqrt(3)*I) == "sqrt(3)*1i" + + +def test_constants(): + assert mcode(pi) == "pi" + assert mcode(oo) == "inf" + assert mcode(-oo) == "-inf" + assert mcode(S.NegativeInfinity) == "-inf" + assert mcode(S.NaN) == "NaN" + assert mcode(S.Exp1) == "exp(1)" + assert mcode(exp(1)) == "exp(1)" + + +def test_constants_other(): + assert mcode(2*GoldenRatio) == "2*(1+sqrt(5))/2" + assert mcode(2*Catalan) == "2*%s" % Catalan.evalf(17) + assert mcode(2*EulerGamma) == "2*%s" % EulerGamma.evalf(17) + + +def test_boolean(): + assert mcode(x & y) == "x & y" + assert mcode(x | y) == "x | y" + assert mcode(~x) == "~x" + assert mcode(x & y & z) == "x & y & z" + assert mcode(x | y | z) == "x | y | z" + assert mcode((x & y) | z) == "z | x & y" + assert mcode((x | y) & z) == "z & (x | y)" + + +def test_KroneckerDelta(): + from sympy.functions import KroneckerDelta + assert mcode(KroneckerDelta(x, y)) == "double(x == y)" + assert mcode(KroneckerDelta(x, y + 1)) == "double(x == (y + 1))" + assert mcode(KroneckerDelta(2**x, y)) == "double((2.^x) == y)" + + +def test_Matrices(): + assert mcode(Matrix(1, 1, [10])) == "10" + A = Matrix([[1, sin(x/2), abs(x)], + [0, 1, pi], + [0, exp(1), ceiling(x)]]) + expected = "[1 sin(x/2) abs(x); 0 1 pi; 0 exp(1) ceil(x)]" + assert mcode(A) == expected + # row and columns + assert mcode(A[:,0]) == "[1; 0; 0]" + assert mcode(A[0,:]) == "[1 sin(x/2) abs(x)]" + # empty matrices + assert mcode(Matrix(0, 0, [])) == '[]' + assert mcode(Matrix(0, 3, [])) == 'zeros(0, 3)' + # annoying to read but correct + assert mcode(Matrix([[x, x - y, -y]])) == "[x x - y -y]" + + +def test_vector_entries_hadamard(): + # For a row or column, user might to use the other dimension + A = Matrix([[1, sin(2/x), 3*pi/x/5]]) + assert mcode(A) == "[1 sin(2./x) 3*pi./(5*x)]" + assert mcode(A.T) == "[1; sin(2./x); 3*pi./(5*x)]" + + +@XFAIL +def test_Matrices_entries_not_hadamard(): + # For Matrix with col >= 2, row >= 2, they need to be scalars + # FIXME: is it worth worrying about this? Its not wrong, just + # leave it user's responsibility to put scalar data for x. + A = Matrix([[1, sin(2/x), 3*pi/x/5], [1, 2, x*y]]) + expected = ("[1 sin(2/x) 3*pi/(5*x);\n" + "1 2 x*y]") # <- we give x.*y + assert mcode(A) == expected + + +def test_MatrixSymbol(): + n = Symbol('n', integer=True) + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, n) + assert mcode(A*B) == "A*B" + assert mcode(B*A) == "B*A" + assert mcode(2*A*B) == "2*A*B" + assert mcode(B*2*A) == "2*B*A" + assert mcode(A*(B + 3*Identity(n))) == "A*(3*eye(n) + B)" + assert mcode(A**(x**2)) == "A^(x.^2)" + assert mcode(A**3) == "A^3" + assert mcode(A**S.Half) == "A^(1/2)" + + +def test_MatrixSolve(): + n = Symbol('n', integer=True) + A = MatrixSymbol('A', n, n) + x = MatrixSymbol('x', n, 1) + assert mcode(MatrixSolve(A, x)) == "A \\ x" + +def test_special_matrices(): + assert mcode(6*Identity(3)) == "6*eye(3)" + + +def test_containers(): + assert mcode([1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]) == \ + "{1, 2, 3, {4, 5, {6, 7}}, 8, {9, 10}, 11}" + assert mcode((1, 2, (3, 4))) == "{1, 2, {3, 4}}" + assert mcode([1]) == "{1}" + assert mcode((1,)) == "{1}" + assert mcode(Tuple(*[1, 2, 3])) == "{1, 2, 3}" + assert mcode((1, x*y, (3, x**2))) == "{1, x.*y, {3, x.^2}}" + # scalar, matrix, empty matrix and empty list + assert mcode((1, eye(3), Matrix(0, 0, []), [])) == "{1, [1 0 0; 0 1 0; 0 0 1], [], {}}" + + +def test_octave_noninline(): + source = mcode((x+y)/Catalan, assign_to='me', inline=False) + expected = ( + "Catalan = %s;\n" + "me = (x + y)/Catalan;" + ) % Catalan.evalf(17) + assert source == expected + + +def test_octave_piecewise(): + expr = Piecewise((x, x < 1), (x**2, True)) + assert mcode(expr) == "((x < 1).*(x) + (~(x < 1)).*(x.^2))" + assert mcode(expr, assign_to="r") == ( + "r = ((x < 1).*(x) + (~(x < 1)).*(x.^2));") + assert mcode(expr, assign_to="r", inline=False) == ( + "if (x < 1)\n" + " r = x;\n" + "else\n" + " r = x.^2;\n" + "end") + expr = Piecewise((x**2, x < 1), (x**3, x < 2), (x**4, x < 3), (x**5, True)) + expected = ("((x < 1).*(x.^2) + (~(x < 1)).*( ...\n" + "(x < 2).*(x.^3) + (~(x < 2)).*( ...\n" + "(x < 3).*(x.^4) + (~(x < 3)).*(x.^5))))") + assert mcode(expr) == expected + assert mcode(expr, assign_to="r") == "r = " + expected + ";" + assert mcode(expr, assign_to="r", inline=False) == ( + "if (x < 1)\n" + " r = x.^2;\n" + "elseif (x < 2)\n" + " r = x.^3;\n" + "elseif (x < 3)\n" + " r = x.^4;\n" + "else\n" + " r = x.^5;\n" + "end") + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: mcode(expr)) + + +def test_octave_piecewise_times_const(): + pw = Piecewise((x, x < 1), (x**2, True)) + assert mcode(2*pw) == "2*((x < 1).*(x) + (~(x < 1)).*(x.^2))" + assert mcode(pw/x) == "((x < 1).*(x) + (~(x < 1)).*(x.^2))./x" + assert mcode(pw/(x*y)) == "((x < 1).*(x) + (~(x < 1)).*(x.^2))./(x.*y)" + assert mcode(pw/3) == "((x < 1).*(x) + (~(x < 1)).*(x.^2))/3" + + +def test_octave_matrix_assign_to(): + A = Matrix([[1, 2, 3]]) + assert mcode(A, assign_to='a') == "a = [1 2 3];" + A = Matrix([[1, 2], [3, 4]]) + assert mcode(A, assign_to='A') == "A = [1 2; 3 4];" + + +def test_octave_matrix_assign_to_more(): + # assigning to Symbol or MatrixSymbol requires lhs/rhs match + A = Matrix([[1, 2, 3]]) + B = MatrixSymbol('B', 1, 3) + C = MatrixSymbol('C', 2, 3) + assert mcode(A, assign_to=B) == "B = [1 2 3];" + raises(ValueError, lambda: mcode(A, assign_to=x)) + raises(ValueError, lambda: mcode(A, assign_to=C)) + + +def test_octave_matrix_1x1(): + A = Matrix([[3]]) + B = MatrixSymbol('B', 1, 1) + C = MatrixSymbol('C', 1, 2) + assert mcode(A, assign_to=B) == "B = 3;" + # FIXME? + #assert mcode(A, assign_to=x) == "x = 3;" + raises(ValueError, lambda: mcode(A, assign_to=C)) + + +def test_octave_matrix_elements(): + A = Matrix([[x, 2, x*y]]) + assert mcode(A[0, 0]**2 + A[0, 1] + A[0, 2]) == "x.^2 + x.*y + 2" + A = MatrixSymbol('AA', 1, 3) + assert mcode(A) == "AA" + assert mcode(A[0, 0]**2 + sin(A[0,1]) + A[0,2]) == \ + "sin(AA(1, 2)) + AA(1, 1).^2 + AA(1, 3)" + assert mcode(sum(A)) == "AA(1, 1) + AA(1, 2) + AA(1, 3)" + + +def test_octave_boolean(): + assert mcode(True) == "true" + assert mcode(S.true) == "true" + assert mcode(False) == "false" + assert mcode(S.false) == "false" + + +def test_octave_not_supported(): + with raises(NotImplementedError): + mcode(S.ComplexInfinity) + f = Function('f') + assert mcode(f(x).diff(x), strict=False) == ( + "% Not supported in Octave:\n" + "% Derivative\n" + "Derivative(f(x), x)" + ) + + +def test_octave_not_supported_not_on_whitelist(): + from sympy.functions.special.polynomials import assoc_laguerre + with raises(NotImplementedError): + mcode(assoc_laguerre(x, y, z)) + + +def test_octave_expint(): + assert mcode(expint(1, x)) == "expint(x)" + with raises(NotImplementedError): + mcode(expint(2, x)) + assert mcode(expint(y, x), strict=False) == ( + "% Not supported in Octave:\n" + "% expint\n" + "expint(y, x)" + ) + + +def test_trick_indent_with_end_else_words(): + # words starting with "end" or "else" do not confuse the indenter + t1 = S('endless') + t2 = S('elsewhere') + pw = Piecewise((t1, x < 0), (t2, x <= 1), (1, True)) + assert mcode(pw, inline=False) == ( + "if (x < 0)\n" + " endless\n" + "elseif (x <= 1)\n" + " elsewhere\n" + "else\n" + " 1\n" + "end") + + +def test_hadamard(): + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + v = MatrixSymbol('v', 3, 1) + h = MatrixSymbol('h', 1, 3) + C = HadamardProduct(A, B) + n = Symbol('n') + assert mcode(C) == "A.*B" + assert mcode(C*v) == "(A.*B)*v" + assert mcode(h*C*v) == "h*(A.*B)*v" + assert mcode(C*A) == "(A.*B)*A" + # mixing Hadamard and scalar strange b/c we vectorize scalars + assert mcode(C*x*y) == "(x.*y)*(A.*B)" + + # Testing HadamardPower: + assert mcode(HadamardPower(A, n)) == "A.**n" + assert mcode(HadamardPower(A, 1+n)) == "A.**(n + 1)" + assert mcode(HadamardPower(A*B.T, 1+n)) == "(A*B.T).**(n + 1)" + + +def test_sparse(): + M = SparseMatrix(5, 6, {}) + M[2, 2] = 10 + M[1, 2] = 20 + M[1, 3] = 22 + M[0, 3] = 30 + M[3, 0] = x*y + assert mcode(M) == ( + "sparse([4 2 3 1 2], [1 3 3 4 4], [x.*y 20 10 30 22], 5, 6)" + ) + + +def test_sinc(): + assert mcode(sinc(x)) == 'sinc(x/pi)' + assert mcode(sinc(x + 3)) == 'sinc((x + 3)/pi)' + assert mcode(sinc(pi*(x + 3))) == 'sinc(x + 3)' + + +def test_trigfun(): + for f in (sin, cos, tan, cot, sec, csc, asin, acos, acot, atan, asec, acsc, + sinh, cosh, tanh, coth, csch, sech, asinh, acosh, atanh, acoth, + asech, acsch): + assert octave_code(f(x) == f.__name__ + '(x)') + + +def test_specfun(): + n = Symbol('n') + for f in [besselj, bessely, besseli, besselk]: + assert octave_code(f(n, x)) == f.__name__ + '(n, x)' + for f in (erfc, erfi, erf, erfinv, erfcinv, fresnelc, fresnels, gamma): + assert octave_code(f(x)) == f.__name__ + '(x)' + assert octave_code(hankel1(n, x)) == 'besselh(n, 1, x)' + assert octave_code(hankel2(n, x)) == 'besselh(n, 2, x)' + assert octave_code(airyai(x)) == 'airy(0, x)' + assert octave_code(airyaiprime(x)) == 'airy(1, x)' + assert octave_code(airybi(x)) == 'airy(2, x)' + assert octave_code(airybiprime(x)) == 'airy(3, x)' + assert octave_code(uppergamma(n, x)) == '(gammainc(x, n, \'upper\').*gamma(n))' + assert octave_code(lowergamma(n, x)) == '(gammainc(x, n).*gamma(n))' + assert octave_code(z**lowergamma(n, x)) == 'z.^(gammainc(x, n).*gamma(n))' + assert octave_code(jn(n, x)) == 'sqrt(2)*sqrt(pi)*sqrt(1./x).*besselj(n + 1/2, x)/2' + assert octave_code(yn(n, x)) == 'sqrt(2)*sqrt(pi)*sqrt(1./x).*bessely(n + 1/2, x)/2' + assert octave_code(LambertW(x)) == 'lambertw(x)' + assert octave_code(LambertW(x, n)) == 'lambertw(n, x)' + + # Automatic rewrite + assert octave_code(Ei(x)) == '(logint(exp(x)))' + assert octave_code(dirichlet_eta(x)) == '(((x == 1).*(log(2)) + (~(x == 1)).*((1 - 2.^(1 - x)).*zeta(x))))' + assert octave_code(riemann_xi(x)) == '(pi.^(-x/2).*x.*(x - 1).*gamma(x/2).*zeta(x)/2)' + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert mcode(A[0, 0]) == "A(1, 1)" + assert mcode(3 * A[0, 0]) == "3*A(1, 1)" + + F = C[0, 0].subs(C, A - B) + assert mcode(F) == "(A - B)(1, 1)" + + +def test_zeta_printing_issue_14820(): + assert octave_code(zeta(x)) == 'zeta(x)' + with raises(NotImplementedError): + octave_code(zeta(x, y)) + + +def test_automatic_rewrite(): + assert octave_code(Li(x)) == '(logint(x) - logint(2))' + assert octave_code(erf2(x, y)) == '(-erf(x) + erf(y))' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_precedence.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_precedence.py new file mode 100644 index 0000000000000000000000000000000000000000..d08ea07483857e8c2ee7f930aa53d2dacdc58193 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_precedence.py @@ -0,0 +1,128 @@ +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.function import Derivative, Function +from sympy.core.numbers import Integer, Rational, Float, oo +from sympy.core.relational import Rel +from sympy.core.symbol import symbols +from sympy.functions import sin +from sympy.integrals.integrals import Integral +from sympy.series.order import Order + +from sympy.printing.precedence import precedence, PRECEDENCE + +x, y = symbols("x,y") + + +def test_Add(): + assert precedence(x + y) == PRECEDENCE["Add"] + assert precedence(x*y + 1) == PRECEDENCE["Add"] + + +def test_Function(): + assert precedence(sin(x)) == PRECEDENCE["Func"] + +def test_Derivative(): + assert precedence(Derivative(x, y)) == PRECEDENCE["Atom"] + +def test_Integral(): + assert precedence(Integral(x, y)) == PRECEDENCE["Atom"] + + +def test_Mul(): + assert precedence(x*y) == PRECEDENCE["Mul"] + assert precedence(-x*y) == PRECEDENCE["Add"] + + +def test_Number(): + assert precedence(Integer(0)) == PRECEDENCE["Atom"] + assert precedence(Integer(1)) == PRECEDENCE["Atom"] + assert precedence(Integer(-1)) == PRECEDENCE["Add"] + assert precedence(Integer(10)) == PRECEDENCE["Atom"] + assert precedence(Rational(5, 2)) == PRECEDENCE["Mul"] + assert precedence(Rational(-5, 2)) == PRECEDENCE["Add"] + assert precedence(Float(5)) == PRECEDENCE["Atom"] + assert precedence(Float(-5)) == PRECEDENCE["Add"] + assert precedence(oo) == PRECEDENCE["Atom"] + assert precedence(-oo) == PRECEDENCE["Add"] + + +def test_Order(): + assert precedence(Order(x)) == PRECEDENCE["Atom"] + + +def test_Pow(): + assert precedence(x**y) == PRECEDENCE["Pow"] + assert precedence(-x**y) == PRECEDENCE["Add"] + assert precedence(x**-y) == PRECEDENCE["Pow"] + + +def test_Product(): + assert precedence(Product(x, (x, y, y + 1))) == PRECEDENCE["Atom"] + + +def test_Relational(): + assert precedence(Rel(x + y, y, "<")) == PRECEDENCE["Relational"] + + +def test_Sum(): + assert precedence(Sum(x, (x, y, y + 1))) == PRECEDENCE["Atom"] + + +def test_Symbol(): + assert precedence(x) == PRECEDENCE["Atom"] + + +def test_And_Or(): + # precedence relations between logical operators, ... + assert precedence(x & y) > precedence(x | y) + assert precedence(~y) > precedence(x & y) + # ... and with other operators (cfr. other programming languages) + assert precedence(x + y) > precedence(x | y) + assert precedence(x + y) > precedence(x & y) + assert precedence(x*y) > precedence(x | y) + assert precedence(x*y) > precedence(x & y) + assert precedence(~y) > precedence(x*y) + assert precedence(~y) > precedence(x - y) + # double checks + assert precedence(x & y) == PRECEDENCE["And"] + assert precedence(x | y) == PRECEDENCE["Or"] + assert precedence(~y) == PRECEDENCE["Not"] + + +def test_custom_function_precedence_comparison(): + """ + Test cases for custom functions with different precedence values, + specifically handling: + 1. Functions with precedence < PRECEDENCE["Mul"] (50) + 2. Functions with precedence = Func (70) + + Key distinction: + 1. Lower precedence functions (45) need parentheses: -2*(x F y) + 2. Higher precedence functions (70) don't: -2*x F y + """ + class LowPrecedenceF(Function): + precedence = PRECEDENCE["Mul"] - 5 + def _sympystr(self, printer): + return f"{printer._print(self.args[0])} F {printer._print(self.args[1])}" + + class HighPrecedenceF(Function): + precedence = PRECEDENCE["Func"] + def _sympystr(self, printer): + return f"{printer._print(self.args[0])} F {printer._print(self.args[1])}" + + def test_low_precedence(): + expr1 = 2 * LowPrecedenceF(x, y) + assert str(expr1) == "2*(x F y)" + + expr2 = -2 * LowPrecedenceF(x, y) + assert str(expr2) == "-2*(x F y)" + + def test_high_precedence(): + expr1 = 2 * HighPrecedenceF(x, y) + assert str(expr1) == "2*x F y" + + expr2 = -2 * HighPrecedenceF(x, y) + assert str(expr2) == "-2*x F y" + + test_low_precedence() + test_high_precedence() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_preview.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_preview.py new file mode 100644 index 0000000000000000000000000000000000000000..91771ceb0466d6b0fee00570426713d02da14872 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_preview.py @@ -0,0 +1,38 @@ +# -*- coding: utf-8 -*- + +from sympy.core.relational import Eq +from sympy.core.symbol import Symbol +from sympy.functions.elementary.piecewise import Piecewise +from sympy.printing.preview import preview + +from io import BytesIO + + +def test_preview(): + x = Symbol('x') + obj = BytesIO() + try: + preview(x, output='png', viewer='BytesIO', outputbuffer=obj) + except RuntimeError: + pass # latex not installed on CI server + + +def test_preview_unicode_symbol(): + # issue 9107 + a = Symbol('α') + obj = BytesIO() + try: + preview(a, output='png', viewer='BytesIO', outputbuffer=obj) + except RuntimeError: + pass # latex not installed on CI server + + +def test_preview_latex_construct_in_expr(): + # see PR 9801 + x = Symbol('x') + pw = Piecewise((1, Eq(x, 0)), (0, True)) + obj = BytesIO() + try: + preview(pw, output='png', viewer='BytesIO', outputbuffer=obj) + except RuntimeError: + pass # latex not installed on CI server diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_pycode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_pycode.py new file mode 100644 index 0000000000000000000000000000000000000000..2c38fe81d830149cdce6b55f15e6e07513fdd146 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_pycode.py @@ -0,0 +1,493 @@ +from sympy import Not +from sympy.codegen import Assignment +from sympy.codegen.ast import none +from sympy.codegen.cfunctions import expm1, log1p +from sympy.codegen.scipy_nodes import cosm1 +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.core import Expr, Mod, symbols, Eq, Le, Gt, zoo, oo, Rational, Pow +from sympy.core.function import Derivative +from sympy.core.numbers import pi +from sympy.core.singleton import S +from sympy.functions import acos, KroneckerDelta, Piecewise, sign, sqrt, Min, Max, cot, acsch, asec, coth, sec, log, sin, cos, tan, asin, atan, sinh, cosh, tanh, asinh, acosh, atanh +from sympy.functions.elementary.trigonometric import atan2 +from sympy.logic import And, Or +from sympy.matrices import SparseMatrix, MatrixSymbol, Identity +from sympy.printing.codeprinter import PrintMethodNotImplementedError +from sympy.printing.pycode import ( + MpmathPrinter, CmathPrinter, PythonCodePrinter, pycode, SymPyPrinter +) +from sympy.printing.tensorflow import TensorflowPrinter +from sympy.printing.numpy import NumPyPrinter, SciPyPrinter +from sympy.testing.pytest import raises, skip +from sympy.tensor import IndexedBase, Idx +from sympy.tensor.array.expressions.array_expressions import ArraySymbol, ArrayDiagonal, ArrayContraction, ZeroArray, OneArray +from sympy.external import import_module +from sympy.functions.special.gamma_functions import loggamma + + + +x, y, z = symbols('x y z') +p = IndexedBase("p") + + +def test_PythonCodePrinter(): + prntr = PythonCodePrinter() + + assert not prntr.module_imports + + assert prntr.doprint(x**y) == 'x**y' + assert prntr.doprint(Mod(x, 2)) == 'x % 2' + assert prntr.doprint(-Mod(x, y)) == '-(x % y)' + assert prntr.doprint(Mod(-x, y)) == '(-x) % y' + assert prntr.doprint(And(x, y)) == 'x and y' + assert prntr.doprint(Or(x, y)) == 'x or y' + assert prntr.doprint(1/(x+y)) == '1/(x + y)' + assert prntr.doprint(Not(x)) == 'not x' + assert not prntr.module_imports + + assert prntr.doprint(pi) == 'math.pi' + assert prntr.module_imports == {'math': {'pi'}} + + assert prntr.doprint(x**Rational(1, 2)) == 'math.sqrt(x)' + assert prntr.doprint(sqrt(x)) == 'math.sqrt(x)' + assert prntr.module_imports == {'math': {'pi', 'sqrt'}} + + assert prntr.doprint(acos(x)) == 'math.acos(x)' + assert prntr.doprint(cot(x)) == '(1/math.tan(x))' + assert prntr.doprint(coth(x)) == '((math.exp(x) + math.exp(-x))/(math.exp(x) - math.exp(-x)))' + assert prntr.doprint(asec(x)) == '(math.acos(1/x))' + assert prntr.doprint(acsch(x)) == '(math.log(math.sqrt(1 + x**(-2)) + 1/x))' + + assert prntr.doprint(Assignment(x, 2)) == 'x = 2' + assert prntr.doprint(Piecewise((1, Eq(x, 0)), + (2, x>6))) == '((1) if (x == 0) else (2) if (x > 6) else None)' + assert prntr.doprint(Piecewise((2, Le(x, 0)), + (3, Gt(x, 0)), evaluate=False)) == '((2) if (x <= 0) else'\ + ' (3) if (x > 0) else None)' + assert prntr.doprint(sign(x)) == '(0.0 if x == 0 else math.copysign(1, x))' + assert prntr.doprint(p[0, 1]) == 'p[0, 1]' + assert prntr.doprint(KroneckerDelta(x,y)) == '(1 if x == y else 0)' + + assert prntr.doprint((2,3)) == "(2, 3)" + assert prntr.doprint([2,3]) == "[2, 3]" + + assert prntr.doprint(Min(x, y)) == "min(x, y)" + assert prntr.doprint(Max(x, y)) == "max(x, y)" + + +def test_PythonCodePrinter_standard(): + prntr = PythonCodePrinter() + + assert prntr.standard == 'python3' + + raises(ValueError, lambda: PythonCodePrinter({'standard':'python4'})) + + +def test_CmathPrinter(): + p = CmathPrinter() + + assert p.doprint(sqrt(x)) == 'cmath.sqrt(x)' + assert p.doprint(log(x)) == 'cmath.log(x)' + + assert p.doprint(sin(x)) == 'cmath.sin(x)' + assert p.doprint(cos(x)) == 'cmath.cos(x)' + assert p.doprint(tan(x)) == 'cmath.tan(x)' + + assert p.doprint(asin(x)) == 'cmath.asin(x)' + assert p.doprint(acos(x)) == 'cmath.acos(x)' + assert p.doprint(atan(x)) == 'cmath.atan(x)' + + assert p.doprint(sinh(x)) == 'cmath.sinh(x)' + assert p.doprint(cosh(x)) == 'cmath.cosh(x)' + assert p.doprint(tanh(x)) == 'cmath.tanh(x)' + + assert p.doprint(asinh(x)) == 'cmath.asinh(x)' + assert p.doprint(acosh(x)) == 'cmath.acosh(x)' + assert p.doprint(atanh(x)) == 'cmath.atanh(x)' + + +def test_MpmathPrinter(): + p = MpmathPrinter() + assert p.doprint(sign(x)) == 'mpmath.sign(x)' + assert p.doprint(Rational(1, 2)) == 'mpmath.mpf(1)/mpmath.mpf(2)' + + assert p.doprint(S.Exp1) == 'mpmath.e' + assert p.doprint(S.Pi) == 'mpmath.pi' + assert p.doprint(S.GoldenRatio) == 'mpmath.phi' + assert p.doprint(S.EulerGamma) == 'mpmath.euler' + assert p.doprint(S.NaN) == 'mpmath.nan' + assert p.doprint(S.Infinity) == 'mpmath.inf' + assert p.doprint(S.NegativeInfinity) == 'mpmath.ninf' + assert p.doprint(loggamma(x)) == 'mpmath.loggamma(x)' + + +def test_NumPyPrinter(): + from sympy.core.function import Lambda + from sympy.matrices.expressions.adjoint import Adjoint + from sympy.matrices.expressions.diagonal import (DiagMatrix, DiagonalMatrix, DiagonalOf) + from sympy.matrices.expressions.funcmatrix import FunctionMatrix + from sympy.matrices.expressions.hadamard import HadamardProduct + from sympy.matrices.expressions.kronecker import KroneckerProduct + from sympy.matrices.expressions.special import (OneMatrix, ZeroMatrix) + from sympy.abc import a, b + p = NumPyPrinter() + assert p.doprint(sign(x)) == 'numpy.sign(x)' + A = MatrixSymbol("A", 2, 2) + B = MatrixSymbol("B", 2, 2) + C = MatrixSymbol("C", 1, 5) + D = MatrixSymbol("D", 3, 4) + assert p.doprint(A**(-1)) == "numpy.linalg.inv(A)" + assert p.doprint(A**5) == "numpy.linalg.matrix_power(A, 5)" + assert p.doprint(Identity(3)) == "numpy.eye(3)" + + u = MatrixSymbol('x', 2, 1) + v = MatrixSymbol('y', 2, 1) + assert p.doprint(MatrixSolve(A, u)) == 'numpy.linalg.solve(A, x)' + assert p.doprint(MatrixSolve(A, u) + v) == 'numpy.linalg.solve(A, x) + y' + + assert p.doprint(ZeroMatrix(2, 3)) == "numpy.zeros((2, 3))" + assert p.doprint(OneMatrix(2, 3)) == "numpy.ones((2, 3))" + assert p.doprint(FunctionMatrix(4, 5, Lambda((a, b), a + b))) == \ + "numpy.fromfunction(lambda a, b: a + b, (4, 5))" + assert p.doprint(HadamardProduct(A, B)) == "numpy.multiply(A, B)" + assert p.doprint(KroneckerProduct(A, B)) == "numpy.kron(A, B)" + assert p.doprint(Adjoint(A)) == "numpy.conjugate(numpy.transpose(A))" + assert p.doprint(DiagonalOf(A)) == "numpy.reshape(numpy.diag(A), (-1, 1))" + assert p.doprint(DiagMatrix(C)) == "numpy.diagflat(C)" + assert p.doprint(DiagonalMatrix(D)) == "numpy.multiply(D, numpy.eye(3, 4))" + + # Workaround for numpy negative integer power errors + assert p.doprint(x**-1) == 'x**(-1.0)' + assert p.doprint(x**-2) == 'x**(-2.0)' + + expr = Pow(2, -1, evaluate=False) + assert p.doprint(expr) == "2**(-1.0)" + + assert p.doprint(S.Exp1) == 'numpy.e' + assert p.doprint(S.Pi) == 'numpy.pi' + assert p.doprint(S.EulerGamma) == 'numpy.euler_gamma' + assert p.doprint(S.NaN) == 'numpy.nan' + assert p.doprint(S.Infinity) == 'numpy.inf' + assert p.doprint(S.NegativeInfinity) == '-numpy.inf' + + # Function rewriting operator precedence fix + assert p.doprint(sec(x)**2) == '(numpy.cos(x)**(-1.0))**2' + + +def test_issue_18770(): + numpy = import_module('numpy') + if not numpy: + skip("numpy not installed.") + + from sympy.functions.elementary.miscellaneous import (Max, Min) + from sympy.utilities.lambdify import lambdify + + expr1 = Min(0.1*x + 3, x + 1, 0.5*x + 1) + func = lambdify(x, expr1, "numpy") + assert (func(numpy.linspace(0, 3, 3)) == [1.0, 1.75, 2.5 ]).all() + assert func(4) == 3 + + expr1 = Max(x**2, x**3) + func = lambdify(x,expr1, "numpy") + assert (func(numpy.linspace(-1, 2, 4)) == [1, 0, 1, 8] ).all() + assert func(4) == 64 + + +def test_SciPyPrinter(): + p = SciPyPrinter() + expr = acos(x) + assert 'numpy' not in p.module_imports + assert p.doprint(expr) == 'numpy.arccos(x)' + assert 'numpy' in p.module_imports + assert not any(m.startswith('scipy') for m in p.module_imports) + smat = SparseMatrix(2, 5, {(0, 1): 3}) + assert p.doprint(smat) == \ + 'scipy.sparse.coo_matrix(([3], ([0], [1])), shape=(2, 5))' + assert 'scipy.sparse' in p.module_imports + + assert p.doprint(S.GoldenRatio) == 'scipy.constants.golden_ratio' + assert p.doprint(S.Pi) == 'scipy.constants.pi' + assert p.doprint(S.Exp1) == 'numpy.e' + + +def test_pycode_reserved_words(): + s1, s2 = symbols('if else') + raises(ValueError, lambda: pycode(s1 + s2, error_on_reserved=True)) + py_str = pycode(s1 + s2) + assert py_str in ('else_ + if_', 'if_ + else_') + + +def test_issue_20762(): + # Make sure pycode removes curly braces from subscripted variables + a_b, b, a_11 = symbols('a_{b} b a_{11}') + expr = a_b*b + assert pycode(expr) == 'a_b*b' + expr = a_11*b + assert pycode(expr) == 'a_11*b' + + +def test_sqrt(): + prntr = PythonCodePrinter() + assert prntr._print_Pow(sqrt(x), rational=False) == 'math.sqrt(x)' + assert prntr._print_Pow(1/sqrt(x), rational=False) == '1/math.sqrt(x)' + + prntr = PythonCodePrinter({'standard' : 'python3'}) + assert prntr._print_Pow(sqrt(x), rational=True) == 'x**(1/2)' + assert prntr._print_Pow(1/sqrt(x), rational=True) == 'x**(-1/2)' + + prntr = MpmathPrinter() + assert prntr._print_Pow(sqrt(x), rational=False) == 'mpmath.sqrt(x)' + assert prntr._print_Pow(sqrt(x), rational=True) == \ + "x**(mpmath.mpf(1)/mpmath.mpf(2))" + + prntr = NumPyPrinter() + assert prntr._print_Pow(sqrt(x), rational=False) == 'numpy.sqrt(x)' + assert prntr._print_Pow(sqrt(x), rational=True) == 'x**(1/2)' + + prntr = SciPyPrinter() + assert prntr._print_Pow(sqrt(x), rational=False) == 'numpy.sqrt(x)' + assert prntr._print_Pow(sqrt(x), rational=True) == 'x**(1/2)' + + prntr = SymPyPrinter() + assert prntr._print_Pow(sqrt(x), rational=False) == 'sympy.sqrt(x)' + assert prntr._print_Pow(sqrt(x), rational=True) == 'x**(1/2)' + + +def test_frac(): + from sympy.functions.elementary.integers import frac + + expr = frac(x) + prntr = NumPyPrinter() + assert prntr.doprint(expr) == 'numpy.mod(x, 1)' + + prntr = SciPyPrinter() + assert prntr.doprint(expr) == 'numpy.mod(x, 1)' + + prntr = PythonCodePrinter() + assert prntr.doprint(expr) == 'x % 1' + + prntr = MpmathPrinter() + assert prntr.doprint(expr) == 'mpmath.frac(x)' + + prntr = SymPyPrinter() + assert prntr.doprint(expr) == 'sympy.functions.elementary.integers.frac(x)' + + +class CustomPrintedObject(Expr): + def _numpycode(self, printer): + return 'numpy' + + def _mpmathcode(self, printer): + return 'mpmath' + + +def test_printmethod(): + obj = CustomPrintedObject() + assert NumPyPrinter().doprint(obj) == 'numpy' + assert MpmathPrinter().doprint(obj) == 'mpmath' + + +def test_codegen_ast_nodes(): + assert pycode(none) == 'None' + + +def test_issue_14283(): + prntr = PythonCodePrinter() + + assert prntr.doprint(zoo) == "math.nan" + assert prntr.doprint(-oo) == "float('-inf')" + + +def test_NumPyPrinter_print_seq(): + n = NumPyPrinter() + + assert n._print_seq(range(2)) == '(0, 1,)' + + +def test_issue_16535_16536(): + from sympy.functions.special.gamma_functions import (lowergamma, uppergamma) + + a = symbols('a') + expr1 = lowergamma(a, x) + expr2 = uppergamma(a, x) + + prntr = SciPyPrinter() + assert prntr.doprint(expr1) == 'scipy.special.gamma(a)*scipy.special.gammainc(a, x)' + assert prntr.doprint(expr2) == 'scipy.special.gamma(a)*scipy.special.gammaincc(a, x)' + + p_numpy = NumPyPrinter() + p_pycode = PythonCodePrinter({'strict': False}) + + for expr in [expr1, expr2]: + with raises(NotImplementedError): + p_numpy.doprint(expr1) + assert "Not supported" in p_pycode.doprint(expr) + + +def test_Integral(): + from sympy.functions.elementary.exponential import exp + from sympy.integrals.integrals import Integral + + single = Integral(exp(-x), (x, 0, oo)) + double = Integral(x**2*exp(x*y), (x, -z, z), (y, 0, z)) + indefinite = Integral(x**2, x) + evaluateat = Integral(x**2, (x, 1)) + + prntr = SciPyPrinter() + assert prntr.doprint(single) == 'scipy.integrate.quad(lambda x: numpy.exp(-x), 0, numpy.inf)[0]' + assert prntr.doprint(double) == 'scipy.integrate.nquad(lambda x, y: x**2*numpy.exp(x*y), ((-z, z), (0, z)))[0]' + raises(NotImplementedError, lambda: prntr.doprint(indefinite)) + raises(NotImplementedError, lambda: prntr.doprint(evaluateat)) + + prntr = MpmathPrinter() + assert prntr.doprint(single) == 'mpmath.quad(lambda x: mpmath.exp(-x), (0, mpmath.inf))' + assert prntr.doprint(double) == 'mpmath.quad(lambda x, y: x**2*mpmath.exp(x*y), (-z, z), (0, z))' + raises(NotImplementedError, lambda: prntr.doprint(indefinite)) + raises(NotImplementedError, lambda: prntr.doprint(evaluateat)) + + +def test_fresnel_integrals(): + from sympy.functions.special.error_functions import (fresnelc, fresnels) + + expr1 = fresnelc(x) + expr2 = fresnels(x) + + prntr = SciPyPrinter() + assert prntr.doprint(expr1) == 'scipy.special.fresnel(x)[1]' + assert prntr.doprint(expr2) == 'scipy.special.fresnel(x)[0]' + + p_numpy = NumPyPrinter() + p_pycode = PythonCodePrinter() + p_mpmath = MpmathPrinter() + for expr in [expr1, expr2]: + with raises(NotImplementedError): + p_numpy.doprint(expr) + with raises(NotImplementedError): + p_pycode.doprint(expr) + + assert p_mpmath.doprint(expr1) == 'mpmath.fresnelc(x)' + assert p_mpmath.doprint(expr2) == 'mpmath.fresnels(x)' + + +def test_beta(): + from sympy.functions.special.beta_functions import beta + + expr = beta(x, y) + + prntr = SciPyPrinter() + assert prntr.doprint(expr) == 'scipy.special.beta(x, y)' + + prntr = NumPyPrinter() + assert prntr.doprint(expr) == '(math.gamma(x)*math.gamma(y)/math.gamma(x + y))' + + prntr = PythonCodePrinter() + assert prntr.doprint(expr) == '(math.gamma(x)*math.gamma(y)/math.gamma(x + y))' + + prntr = PythonCodePrinter({'allow_unknown_functions': True}) + assert prntr.doprint(expr) == '(math.gamma(x)*math.gamma(y)/math.gamma(x + y))' + + prntr = MpmathPrinter() + assert prntr.doprint(expr) == 'mpmath.beta(x, y)' + +def test_airy(): + from sympy.functions.special.bessel import (airyai, airybi) + + expr1 = airyai(x) + expr2 = airybi(x) + + prntr = SciPyPrinter() + assert prntr.doprint(expr1) == 'scipy.special.airy(x)[0]' + assert prntr.doprint(expr2) == 'scipy.special.airy(x)[2]' + + prntr = NumPyPrinter({'strict': False}) + assert "Not supported" in prntr.doprint(expr1) + assert "Not supported" in prntr.doprint(expr2) + + prntr = PythonCodePrinter({'strict': False}) + assert "Not supported" in prntr.doprint(expr1) + assert "Not supported" in prntr.doprint(expr2) + +def test_airy_prime(): + from sympy.functions.special.bessel import (airyaiprime, airybiprime) + + expr1 = airyaiprime(x) + expr2 = airybiprime(x) + + prntr = SciPyPrinter() + assert prntr.doprint(expr1) == 'scipy.special.airy(x)[1]' + assert prntr.doprint(expr2) == 'scipy.special.airy(x)[3]' + + prntr = NumPyPrinter({'strict': False}) + assert "Not supported" in prntr.doprint(expr1) + assert "Not supported" in prntr.doprint(expr2) + + prntr = PythonCodePrinter({'strict': False}) + assert "Not supported" in prntr.doprint(expr1) + assert "Not supported" in prntr.doprint(expr2) + + +def test_numerical_accuracy_functions(): + prntr = SciPyPrinter() + assert prntr.doprint(expm1(x)) == 'numpy.expm1(x)' + assert prntr.doprint(log1p(x)) == 'numpy.log1p(x)' + assert prntr.doprint(cosm1(x)) == 'scipy.special.cosm1(x)' + +def test_array_printer(): + A = ArraySymbol('A', (4,4,6,6,6)) + I = IndexedBase('I') + i,j,k = Idx('i', (0,1)), Idx('j', (2,3)), Idx('k', (4,5)) + + prntr = NumPyPrinter() + assert prntr.doprint(ZeroArray(5)) == 'numpy.zeros((5,))' + assert prntr.doprint(OneArray(5)) == 'numpy.ones((5,))' + assert prntr.doprint(ArrayContraction(A, [2,3])) == 'numpy.einsum("abccd->abd", A)' + assert prntr.doprint(I) == 'I' + assert prntr.doprint(ArrayDiagonal(A, [2,3,4])) == 'numpy.einsum("abccc->abc", A)' + assert prntr.doprint(ArrayDiagonal(A, [0,1], [2,3])) == 'numpy.einsum("aabbc->cab", A)' + assert prntr.doprint(ArrayContraction(A, [2], [3])) == 'numpy.einsum("abcde->abe", A)' + assert prntr.doprint(Assignment(I[i,j,k], I[i,j,k])) == 'I = I' + + prntr = TensorflowPrinter() + assert prntr.doprint(ZeroArray(5)) == 'tensorflow.zeros((5,))' + assert prntr.doprint(OneArray(5)) == 'tensorflow.ones((5,))' + assert prntr.doprint(ArrayContraction(A, [2,3])) == 'tensorflow.linalg.einsum("abccd->abd", A)' + assert prntr.doprint(I) == 'I' + assert prntr.doprint(ArrayDiagonal(A, [2,3,4])) == 'tensorflow.linalg.einsum("abccc->abc", A)' + assert prntr.doprint(ArrayDiagonal(A, [0,1], [2,3])) == 'tensorflow.linalg.einsum("aabbc->cab", A)' + assert prntr.doprint(ArrayContraction(A, [2], [3])) == 'tensorflow.linalg.einsum("abcde->abe", A)' + assert prntr.doprint(Assignment(I[i,j,k], I[i,j,k])) == 'I = I' + + +def test_custom_Derivative_methods(): + class MyPrinter(SciPyPrinter): + def _print_Derivative_cosm1(self, args, seq_orders): + arg, = args + order, = seq_orders + return 'my_custom_cosm1(%s, deriv_order=%d)' % (self._print(arg), order) + + def _print_Derivative_atan2(self, args, seq_orders): + arg1, arg2 = args + ord1, ord2 = seq_orders + return 'my_custom_atan2(%s, %s, deriv1=%d, deriv2=%d)' % ( + self._print(arg1), self._print(arg2), ord1, ord2 + ) + + p = MyPrinter() + cosm1_1 = cosm1(x).diff(x, evaluate=False) + assert p.doprint(cosm1_1) == 'my_custom_cosm1(x, deriv_order=1)' + atan2_2_3 = atan2(x, y).diff(x, 2, y, 3, evaluate=False) + assert p.doprint(atan2_2_3) == 'my_custom_atan2(x, y, deriv1=2, deriv2=3)' + + try: + p.doprint(expm1(x).diff(x, evaluate=False)) + except PrintMethodNotImplementedError as e: + assert '_print_Derivative_expm1' in repr(e) + else: + assert False # should have thrown + + try: + p.doprint(Derivative(cosm1(x**2),x)) + except ValueError as e: + assert '_print_Derivative(' in repr(e) + else: + assert False # should have thrown diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_python.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_python.py new file mode 100644 index 0000000000000000000000000000000000000000..fb94a662be90934a672d08b3de44a22e2580d8b6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_python.py @@ -0,0 +1,203 @@ +from sympy.core.function import (Derivative, Function) +from sympy.core.numbers import (I, Rational, oo, pi) +from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne) +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (Abs, conjugate) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.integrals.integrals import Integral +from sympy.matrices.dense import Matrix +from sympy.series.limits import limit + +from sympy.printing.python import python + +from sympy.testing.pytest import raises, XFAIL + +x, y = symbols('x,y') +th = Symbol('theta') +ph = Symbol('phi') + + +def test_python_basic(): + # Simple numbers/symbols + assert python(-Rational(1)/2) == "e = Rational(-1, 2)" + assert python(-Rational(13)/22) == "e = Rational(-13, 22)" + assert python(oo) == "e = oo" + + # Powers + assert python(x**2) == "x = Symbol(\'x\')\ne = x**2" + assert python(1/x) == "x = Symbol('x')\ne = 1/x" + assert python(y*x**-2) == "y = Symbol('y')\nx = Symbol('x')\ne = y/x**2" + assert python( + x**Rational(-5, 2)) == "x = Symbol('x')\ne = x**Rational(-5, 2)" + + # Sums of terms + assert python(x**2 + x + 1) in [ + "x = Symbol('x')\ne = 1 + x + x**2", + "x = Symbol('x')\ne = x + x**2 + 1", + "x = Symbol('x')\ne = x**2 + x + 1", ] + assert python(1 - x) in [ + "x = Symbol('x')\ne = 1 - x", + "x = Symbol('x')\ne = -x + 1"] + assert python(1 - 2*x) in [ + "x = Symbol('x')\ne = 1 - 2*x", + "x = Symbol('x')\ne = -2*x + 1"] + assert python(1 - Rational(3, 2)*y/x) in [ + "y = Symbol('y')\nx = Symbol('x')\ne = 1 - 3/2*y/x", + "y = Symbol('y')\nx = Symbol('x')\ne = -3/2*y/x + 1", + "y = Symbol('y')\nx = Symbol('x')\ne = 1 - 3*y/(2*x)"] + + # Multiplication + assert python(x/y) == "x = Symbol('x')\ny = Symbol('y')\ne = x/y" + assert python(-x/y) == "x = Symbol('x')\ny = Symbol('y')\ne = -x/y" + assert python((x + 2)/y) in [ + "y = Symbol('y')\nx = Symbol('x')\ne = 1/y*(2 + x)", + "y = Symbol('y')\nx = Symbol('x')\ne = 1/y*(x + 2)", + "x = Symbol('x')\ny = Symbol('y')\ne = 1/y*(2 + x)", + "x = Symbol('x')\ny = Symbol('y')\ne = (2 + x)/y", + "x = Symbol('x')\ny = Symbol('y')\ne = (x + 2)/y"] + assert python((1 + x)*y) in [ + "y = Symbol('y')\nx = Symbol('x')\ne = y*(1 + x)", + "y = Symbol('y')\nx = Symbol('x')\ne = y*(x + 1)", ] + + # Check for proper placement of negative sign + assert python(-5*x/(x + 10)) == "x = Symbol('x')\ne = -5*x/(x + 10)" + assert python(1 - Rational(3, 2)*(x + 1)) in [ + "x = Symbol('x')\ne = Rational(-3, 2)*x + Rational(-1, 2)", + "x = Symbol('x')\ne = -3*x/2 + Rational(-1, 2)", + "x = Symbol('x')\ne = -3*x/2 + Rational(-1, 2)" + ] + + +def test_python_keyword_symbol_name_escaping(): + # Check for escaping of keywords + assert python( + 5*Symbol("lambda")) == "lambda_ = Symbol('lambda')\ne = 5*lambda_" + assert (python(5*Symbol("lambda") + 7*Symbol("lambda_")) == + "lambda__ = Symbol('lambda')\nlambda_ = Symbol('lambda_')\ne = 7*lambda_ + 5*lambda__") + assert (python(5*Symbol("for") + Function("for_")(8)) == + "for__ = Symbol('for')\nfor_ = Function('for_')\ne = 5*for__ + for_(8)") + + +def test_python_keyword_function_name_escaping(): + assert python( + 5*Function("for")(8)) == "for_ = Function('for')\ne = 5*for_(8)" + + +def test_python_relational(): + assert python(Eq(x, y)) == "x = Symbol('x')\ny = Symbol('y')\ne = Eq(x, y)" + assert python(Ge(x, y)) == "x = Symbol('x')\ny = Symbol('y')\ne = x >= y" + assert python(Le(x, y)) == "x = Symbol('x')\ny = Symbol('y')\ne = x <= y" + assert python(Gt(x, y)) == "x = Symbol('x')\ny = Symbol('y')\ne = x > y" + assert python(Lt(x, y)) == "x = Symbol('x')\ny = Symbol('y')\ne = x < y" + assert python(Ne(x/(y + 1), y**2)) in [ + "x = Symbol('x')\ny = Symbol('y')\ne = Ne(x/(1 + y), y**2)", + "x = Symbol('x')\ny = Symbol('y')\ne = Ne(x/(y + 1), y**2)"] + + +def test_python_functions(): + # Simple + assert python(2*x + exp(x)) in "x = Symbol('x')\ne = 2*x + exp(x)" + assert python(sqrt(2)) == 'e = sqrt(2)' + assert python(2**Rational(1, 3)) == 'e = 2**Rational(1, 3)' + assert python(sqrt(2 + pi)) == 'e = sqrt(2 + pi)' + assert python((2 + pi)**Rational(1, 3)) == 'e = (2 + pi)**Rational(1, 3)' + assert python(2**Rational(1, 4)) == 'e = 2**Rational(1, 4)' + assert python(Abs(x)) == "x = Symbol('x')\ne = Abs(x)" + assert python( + Abs(x/(x**2 + 1))) in ["x = Symbol('x')\ne = Abs(x/(1 + x**2))", + "x = Symbol('x')\ne = Abs(x/(x**2 + 1))"] + + # Univariate/Multivariate functions + f = Function('f') + assert python(f(x)) == "x = Symbol('x')\nf = Function('f')\ne = f(x)" + assert python(f(x, y)) == "x = Symbol('x')\ny = Symbol('y')\nf = Function('f')\ne = f(x, y)" + assert python(f(x/(y + 1), y)) in [ + "x = Symbol('x')\ny = Symbol('y')\nf = Function('f')\ne = f(x/(1 + y), y)", + "x = Symbol('x')\ny = Symbol('y')\nf = Function('f')\ne = f(x/(y + 1), y)"] + + # Nesting of square roots + assert python(sqrt((sqrt(x + 1)) + 1)) in [ + "x = Symbol('x')\ne = sqrt(1 + sqrt(1 + x))", + "x = Symbol('x')\ne = sqrt(sqrt(x + 1) + 1)"] + + # Nesting of powers + assert python((((x + 1)**Rational(1, 3)) + 1)**Rational(1, 3)) in [ + "x = Symbol('x')\ne = (1 + (1 + x)**Rational(1, 3))**Rational(1, 3)", + "x = Symbol('x')\ne = ((x + 1)**Rational(1, 3) + 1)**Rational(1, 3)"] + + # Function powers + assert python(sin(x)**2) == "x = Symbol('x')\ne = sin(x)**2" + + +@XFAIL +def test_python_functions_conjugates(): + a, b = map(Symbol, 'ab') + assert python( conjugate(a + b*I) ) == '_ _\na - I*b' + assert python( conjugate(exp(a + b*I)) ) == ' _ _\n a - I*b\ne ' + + +def test_python_derivatives(): + # Simple + f_1 = Derivative(log(x), x, evaluate=False) + assert python(f_1) == "x = Symbol('x')\ne = Derivative(log(x), x)" + + f_2 = Derivative(log(x), x, evaluate=False) + x + assert python(f_2) == "x = Symbol('x')\ne = x + Derivative(log(x), x)" + + # Multiple symbols + f_3 = Derivative(log(x) + x**2, x, y, evaluate=False) + assert python(f_3) == \ + "x = Symbol('x')\ny = Symbol('y')\ne = Derivative(x**2 + log(x), x, y)" + + f_4 = Derivative(2*x*y, y, x, evaluate=False) + x**2 + assert python(f_4) in [ + "x = Symbol('x')\ny = Symbol('y')\ne = x**2 + Derivative(2*x*y, y, x)", + "x = Symbol('x')\ny = Symbol('y')\ne = Derivative(2*x*y, y, x) + x**2"] + + +def test_python_integrals(): + # Simple + f_1 = Integral(log(x), x) + assert python(f_1) == "x = Symbol('x')\ne = Integral(log(x), x)" + + f_2 = Integral(x**2, x) + assert python(f_2) == "x = Symbol('x')\ne = Integral(x**2, x)" + + # Double nesting of pow + f_3 = Integral(x**(2**x), x) + assert python(f_3) == "x = Symbol('x')\ne = Integral(x**(2**x), x)" + + # Definite integrals + f_4 = Integral(x**2, (x, 1, 2)) + assert python(f_4) == "x = Symbol('x')\ne = Integral(x**2, (x, 1, 2))" + + f_5 = Integral(x**2, (x, Rational(1, 2), 10)) + assert python( + f_5) == "x = Symbol('x')\ne = Integral(x**2, (x, Rational(1, 2), 10))" + + # Nested integrals + f_6 = Integral(x**2*y**2, x, y) + assert python(f_6) == "x = Symbol('x')\ny = Symbol('y')\ne = Integral(x**2*y**2, x, y)" + + +def test_python_matrix(): + p = python(Matrix([[x**2+1, 1], [y, x+y]])) + s = "x = Symbol('x')\ny = Symbol('y')\ne = MutableDenseMatrix([[x**2 + 1, 1], [y, x + y]])" + assert p == s + +def test_python_limits(): + assert python(limit(x, x, oo)) == 'e = oo' + assert python(limit(x**2, x, 0)) == 'e = 0' + +def test_issue_20762(): + # Make sure Python removes curly braces from subscripted variables + a_b = Symbol('a_{b}') + b = Symbol('b') + expr = a_b*b + assert python(expr) == "a_b = Symbol('a_{b}')\nb = Symbol('b')\ne = a_b*b" + + +def test_settings(): + raises(TypeError, lambda: python(x, method="garbage")) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rcode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rcode.py new file mode 100644 index 0000000000000000000000000000000000000000..a83235b0654c6bf24c30846dbf68678d29cd3c80 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rcode.py @@ -0,0 +1,476 @@ +from sympy.core import (S, pi, oo, Symbol, symbols, Rational, Integer, + GoldenRatio, EulerGamma, Catalan, Lambda, Dummy) +from sympy.functions import (Piecewise, sin, cos, Abs, exp, ceiling, sqrt, + gamma, sign, Max, Min, factorial, beta) +from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne) +from sympy.sets import Range +from sympy.logic import ITE +from sympy.codegen import For, aug_assign, Assignment +from sympy.testing.pytest import raises +from sympy.printing.rcode import RCodePrinter +from sympy.utilities.lambdify import implemented_function +from sympy.tensor import IndexedBase, Idx +from sympy.matrices import Matrix, MatrixSymbol + +from sympy.printing.rcode import rcode + +x, y, z = symbols('x,y,z') + + +def test_printmethod(): + class fabs(Abs): + def _rcode(self, printer): + return "abs(%s)" % printer._print(self.args[0]) + + assert rcode(fabs(x)) == "abs(x)" + + +def test_rcode_sqrt(): + assert rcode(sqrt(x)) == "sqrt(x)" + assert rcode(x**0.5) == "sqrt(x)" + assert rcode(sqrt(x)) == "sqrt(x)" + + +def test_rcode_Pow(): + assert rcode(x**3) == "x^3" + assert rcode(x**(y**3)) == "x^(y^3)" + g = implemented_function('g', Lambda(x, 2*x)) + assert rcode(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "(3.5*2*x)^(-x + y^x)/(x^2 + y)" + assert rcode(x**-1.0) == '1.0/x' + assert rcode(x**Rational(2, 3)) == 'x^(2.0/3.0)' + _cond_cfunc = [(lambda base, exp: exp.is_integer, "dpowi"), + (lambda base, exp: not exp.is_integer, "pow")] + assert rcode(x**3, user_functions={'Pow': _cond_cfunc}) == 'dpowi(x, 3)' + assert rcode(x**3.2, user_functions={'Pow': _cond_cfunc}) == 'pow(x, 3.2)' + + +def test_rcode_Max(): + # Test for gh-11926 + assert rcode(Max(x,x*x),user_functions={"Max":"my_max", "Pow":"my_pow"}) == 'my_max(x, my_pow(x, 2))' + + +def test_rcode_constants_mathh(): + assert rcode(exp(1)) == "exp(1)" + assert rcode(pi) == "pi" + assert rcode(oo) == "Inf" + assert rcode(-oo) == "-Inf" + + +def test_rcode_constants_other(): + assert rcode(2*GoldenRatio) == "GoldenRatio = 1.61803398874989;\n2*GoldenRatio" + assert rcode( + 2*Catalan) == "Catalan = 0.915965594177219;\n2*Catalan" + assert rcode(2*EulerGamma) == "EulerGamma = 0.577215664901533;\n2*EulerGamma" + + +def test_rcode_Rational(): + assert rcode(Rational(3, 7)) == "3.0/7.0" + assert rcode(Rational(18, 9)) == "2" + assert rcode(Rational(3, -7)) == "-3.0/7.0" + assert rcode(Rational(-3, -7)) == "3.0/7.0" + assert rcode(x + Rational(3, 7)) == "x + 3.0/7.0" + assert rcode(Rational(3, 7)*x) == "(3.0/7.0)*x" + + +def test_rcode_Integer(): + assert rcode(Integer(67)) == "67" + assert rcode(Integer(-1)) == "-1" + + +def test_rcode_functions(): + assert rcode(sin(x) ** cos(x)) == "sin(x)^cos(x)" + assert rcode(factorial(x) + gamma(y)) == "factorial(x) + gamma(y)" + assert rcode(beta(Min(x, y), Max(x, y))) == "beta(min(x, y), max(x, y))" + + +def test_rcode_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert rcode(g(x)) == "2*x" + g = implemented_function('g', Lambda(x, 2*x/Catalan)) + assert rcode( + g(x)) == "Catalan = %s;\n2*x/Catalan" % Catalan.n() + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + res=rcode(g(A[i]), assign_to=A[i]) + ref=( + "for (i in 1:n){\n" + " A[i] = (A[i] + 1)*(A[i] + 2)*A[i];\n" + "}" + ) + assert res == ref + + +def test_rcode_exceptions(): + assert rcode(ceiling(x)) == "ceiling(x)" + assert rcode(Abs(x)) == "abs(x)" + assert rcode(gamma(x)) == "gamma(x)" + + +def test_rcode_user_functions(): + x = symbols('x', integer=False) + n = symbols('n', integer=True) + custom_functions = { + "ceiling": "myceil", + "Abs": [(lambda x: not x.is_integer, "fabs"), (lambda x: x.is_integer, "abs")], + } + assert rcode(ceiling(x), user_functions=custom_functions) == "myceil(x)" + assert rcode(Abs(x), user_functions=custom_functions) == "fabs(x)" + assert rcode(Abs(n), user_functions=custom_functions) == "abs(n)" + + +def test_rcode_boolean(): + assert rcode(True) == "True" + assert rcode(S.true) == "True" + assert rcode(False) == "False" + assert rcode(S.false) == "False" + assert rcode(x & y) == "x & y" + assert rcode(x | y) == "x | y" + assert rcode(~x) == "!x" + assert rcode(x & y & z) == "x & y & z" + assert rcode(x | y | z) == "x | y | z" + assert rcode((x & y) | z) == "z | x & y" + assert rcode((x | y) & z) == "z & (x | y)" + +def test_rcode_Relational(): + assert rcode(Eq(x, y)) == "x == y" + assert rcode(Ne(x, y)) == "x != y" + assert rcode(Le(x, y)) == "x <= y" + assert rcode(Lt(x, y)) == "x < y" + assert rcode(Gt(x, y)) == "x > y" + assert rcode(Ge(x, y)) == "x >= y" + + +def test_rcode_Piecewise(): + expr = Piecewise((x, x < 1), (x**2, True)) + res=rcode(expr) + ref="ifelse(x < 1,x,x^2)" + assert res == ref + tau=Symbol("tau") + res=rcode(expr,tau) + ref="tau = ifelse(x < 1,x,x^2);" + assert res == ref + + expr = 2*Piecewise((x, x < 1), (x**2, x<2), (x**3,True)) + assert rcode(expr) == "2*ifelse(x < 1,x,ifelse(x < 2,x^2,x^3))" + res = rcode(expr, assign_to='c') + assert res == "c = 2*ifelse(x < 1,x,ifelse(x < 2,x^2,x^3));" + + # Check that Piecewise without a True (default) condition error + #expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + #raises(ValueError, lambda: rcode(expr)) + expr = 2*Piecewise((x, x < 1), (x**2, x<2)) + assert(rcode(expr))== "2*ifelse(x < 1,x,ifelse(x < 2,x^2,NA))" + + +def test_rcode_sinc(): + from sympy.functions.elementary.trigonometric import sinc + expr = sinc(x) + res = rcode(expr) + ref = "(ifelse(x != 0,sin(x)/x,1))" + assert res == ref + + +def test_rcode_Piecewise_deep(): + p = rcode(2*Piecewise((x, x < 1), (x + 1, x < 2), (x**2, True))) + assert p == "2*ifelse(x < 1,x,ifelse(x < 2,x + 1,x^2))" + expr = x*y*z + x**2 + y**2 + Piecewise((0, x < 0.5), (1, True)) + cos(z) - 1 + p = rcode(expr) + ref="x^2 + x*y*z + y^2 + ifelse(x < 0.5,0,1) + cos(z) - 1" + assert p == ref + + ref="c = x^2 + x*y*z + y^2 + ifelse(x < 0.5,0,1) + cos(z) - 1;" + p = rcode(expr, assign_to='c') + assert p == ref + + +def test_rcode_ITE(): + expr = ITE(x < 1, y, z) + p = rcode(expr) + ref="ifelse(x < 1,y,z)" + assert p == ref + + +def test_rcode_settings(): + raises(TypeError, lambda: rcode(sin(x), method="garbage")) + + +def test_rcode_Indexed(): + n, m, o = symbols('n m o', integer=True) + i, j, k = Idx('i', n), Idx('j', m), Idx('k', o) + p = RCodePrinter() + p._not_r = set() + + x = IndexedBase('x')[j] + assert p._print_Indexed(x) == 'x[j]' + A = IndexedBase('A')[i, j] + assert p._print_Indexed(A) == 'A[i, j]' + B = IndexedBase('B')[i, j, k] + assert p._print_Indexed(B) == 'B[i, j, k]' + + assert p._not_r == set() + +def test_rcode_Indexed_without_looking_for_contraction(): + len_y = 5 + y = IndexedBase('y', shape=(len_y,)) + x = IndexedBase('x', shape=(len_y,)) + Dy = IndexedBase('Dy', shape=(len_y-1,)) + i = Idx('i', len_y-1) + e=Eq(Dy[i], (y[i+1]-y[i])/(x[i+1]-x[i])) + code0 = rcode(e.rhs, assign_to=e.lhs, contract=False) + assert code0 == 'Dy[i] = (y[%s] - y[i])/(x[%s] - x[i]);' % (i + 1, i + 1) + + +def test_rcode_loops_matrix_vector(): + n, m = symbols('n m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + + s = ( + 'for (i in 1:m){\n' + ' y[i] = 0;\n' + '}\n' + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' y[i] = A[i, j]*x[j] + y[i];\n' + ' }\n' + '}' + ) + c = rcode(A[i, j]*x[j], assign_to=y[i]) + assert c == s + + +def test_dummy_loops(): + # the following line could also be + # [Dummy(s, integer=True) for s in 'im'] + # or [Dummy(integer=True) for s in 'im'] + i, m = symbols('i m', integer=True, cls=Dummy) + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx(i, m) + + expected = ( + 'for (i_%(icount)i in 1:m_%(mcount)i){\n' + ' y[i_%(icount)i] = x[i_%(icount)i];\n' + '}' + ) % {'icount': i.label.dummy_index, 'mcount': m.dummy_index} + code = rcode(x[i], assign_to=y[i]) + assert code == expected + + +def test_rcode_loops_add(): + n, m = symbols('n m', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + z = IndexedBase('z') + i = Idx('i', m) + j = Idx('j', n) + + s = ( + 'for (i in 1:m){\n' + ' y[i] = x[i] + z[i];\n' + '}\n' + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' y[i] = A[i, j]*x[j] + y[i];\n' + ' }\n' + '}' + ) + c = rcode(A[i, j]*x[j] + x[i] + z[i], assign_to=y[i]) + assert c == s + + +def test_rcode_loops_multiple_contractions(): + n, m, o, p = symbols('n m o p', integer=True) + a = IndexedBase('a') + b = IndexedBase('b') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + k = Idx('k', o) + l = Idx('l', p) + + s = ( + 'for (i in 1:m){\n' + ' y[i] = 0;\n' + '}\n' + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' for (k in 1:o){\n' + ' for (l in 1:p){\n' + ' y[i] = a[i, j, k, l]*b[j, k, l] + y[i];\n' + ' }\n' + ' }\n' + ' }\n' + '}' + ) + c = rcode(b[j, k, l]*a[i, j, k, l], assign_to=y[i]) + assert c == s + + +def test_rcode_loops_addfactor(): + n, m, o, p = symbols('n m o p', integer=True) + a = IndexedBase('a') + b = IndexedBase('b') + c = IndexedBase('c') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + k = Idx('k', o) + l = Idx('l', p) + + s = ( + 'for (i in 1:m){\n' + ' y[i] = 0;\n' + '}\n' + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' for (k in 1:o){\n' + ' for (l in 1:p){\n' + ' y[i] = (a[i, j, k, l] + b[i, j, k, l])*c[j, k, l] + y[i];\n' + ' }\n' + ' }\n' + ' }\n' + '}' + ) + c = rcode((a[i, j, k, l] + b[i, j, k, l])*c[j, k, l], assign_to=y[i]) + assert c == s + + +def test_rcode_loops_multiple_terms(): + n, m, o, p = symbols('n m o p', integer=True) + a = IndexedBase('a') + b = IndexedBase('b') + c = IndexedBase('c') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + k = Idx('k', o) + + s0 = ( + 'for (i in 1:m){\n' + ' y[i] = 0;\n' + '}\n' + ) + s1 = ( + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' for (k in 1:o){\n' + ' y[i] = b[j]*b[k]*c[i, j, k] + y[i];\n' + ' }\n' + ' }\n' + '}\n' + ) + s2 = ( + 'for (i in 1:m){\n' + ' for (k in 1:o){\n' + ' y[i] = a[i, k]*b[k] + y[i];\n' + ' }\n' + '}\n' + ) + s3 = ( + 'for (i in 1:m){\n' + ' for (j in 1:n){\n' + ' y[i] = a[i, j]*b[j] + y[i];\n' + ' }\n' + '}\n' + ) + c = rcode( + b[j]*a[i, j] + b[k]*a[i, k] + b[j]*b[k]*c[i, j, k], assign_to=y[i]) + + ref={} + ref[0] = s0 + s1 + s2 + s3[:-1] + ref[1] = s0 + s1 + s3 + s2[:-1] + ref[2] = s0 + s2 + s1 + s3[:-1] + ref[3] = s0 + s2 + s3 + s1[:-1] + ref[4] = s0 + s3 + s1 + s2[:-1] + ref[5] = s0 + s3 + s2 + s1[:-1] + + assert (c == ref[0] or + c == ref[1] or + c == ref[2] or + c == ref[3] or + c == ref[4] or + c == ref[5]) + + +def test_dereference_printing(): + expr = x + y + sin(z) + z + assert rcode(expr, dereference=[z]) == "x + y + (*z) + sin((*z))" + + +def test_Matrix_printing(): + # Test returning a Matrix + mat = Matrix([x*y, Piecewise((2 + x, y>0), (y, True)), sin(z)]) + A = MatrixSymbol('A', 3, 1) + p = rcode(mat, A) + assert p == ( + "A[0] = x*y;\n" + "A[1] = ifelse(y > 0,x + 2,y);\n" + "A[2] = sin(z);") + # Test using MatrixElements in expressions + expr = Piecewise((2*A[2, 0], x > 0), (A[2, 0], True)) + sin(A[1, 0]) + A[0, 0] + p = rcode(expr) + assert p == ("ifelse(x > 0,2*A[2],A[2]) + sin(A[1]) + A[0]") + # Test using MatrixElements in a Matrix + q = MatrixSymbol('q', 5, 1) + M = MatrixSymbol('M', 3, 3) + m = Matrix([[sin(q[1,0]), 0, cos(q[2,0])], + [q[1,0] + q[2,0], q[3, 0], 5], + [2*q[4, 0]/q[1,0], sqrt(q[0,0]) + 4, 0]]) + assert rcode(m, M) == ( + "M[0] = sin(q[1]);\n" + "M[1] = 0;\n" + "M[2] = cos(q[2]);\n" + "M[3] = q[1] + q[2];\n" + "M[4] = q[3];\n" + "M[5] = 5;\n" + "M[6] = 2*q[4]/q[1];\n" + "M[7] = sqrt(q[0]) + 4;\n" + "M[8] = 0;") + + +def test_rcode_sgn(): + + expr = sign(x) * y + assert rcode(expr) == 'y*sign(x)' + p = rcode(expr, 'z') + assert p == 'z = y*sign(x);' + + p = rcode(sign(2 * x + x**2) * x + x**2) + assert p == "x^2 + x*sign(x^2 + 2*x)" + + expr = sign(cos(x)) + p = rcode(expr) + assert p == 'sign(cos(x))' + +def test_rcode_Assignment(): + assert rcode(Assignment(x, y + z)) == 'x = y + z;' + assert rcode(aug_assign(x, '+', y + z)) == 'x += y + z;' + + +def test_rcode_For(): + f = For(x, Range(0, 10, 2), [aug_assign(y, '*', x)]) + sol = rcode(f) + assert sol == ("for(x in seq(from=0, to=9, by=2){\n" + " y *= x;\n" + "}") + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(rcode(A[0, 0]) == "A[0]") + assert(rcode(3 * A[0, 0]) == "3*A[0]") + + F = C[0, 0].subs(C, A - B) + assert(rcode(F) == "(A - B)[0]") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_repr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_repr.py new file mode 100644 index 0000000000000000000000000000000000000000..da58883b4fb027ed82db842a0a1ce5f76a49a8bb --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_repr.py @@ -0,0 +1,382 @@ +from __future__ import annotations +from typing import Any + +from sympy.external.gmpy import GROUND_TYPES +from sympy.testing.pytest import raises, warns_deprecated_sympy +from sympy.assumptions.ask import Q +from sympy.core.function import (Function, WildFunction) +from sympy.core.numbers import (AlgebraicNumber, Float, Integer, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, Wild, symbols) +from sympy.core.sympify import sympify +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import sin +from sympy.functions.special.delta_functions import Heaviside +from sympy.logic.boolalg import (false, true) +from sympy.matrices.dense import (Matrix, ones) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.immutable import ImmutableDenseMatrix +from sympy.combinatorics import Cycle, Permutation +from sympy.core.symbol import Str +from sympy.geometry import Point, Ellipse +from sympy.printing import srepr +from sympy.polys import ring, field, ZZ, QQ, lex, grlex, Poly +from sympy.polys.polyclasses import DMP +from sympy.polys.agca.extensions import FiniteExtension + +x, y = symbols('x,y') + +# eval(srepr(expr)) == expr has to succeed in the right environment. The right +# environment is the scope of "from sympy import *" for most cases. +ENV: dict[str, Any] = {"Str": Str} +exec("from sympy import *", ENV) + + +def sT(expr, string, import_stmt=None, **kwargs): + """ + sT := sreprTest + + Tests that srepr delivers the expected string and that + the condition eval(srepr(expr))==expr holds. + """ + if import_stmt is None: + ENV2 = ENV + else: + ENV2 = ENV.copy() + exec(import_stmt, ENV2) + + assert srepr(expr, **kwargs) == string + assert eval(string, ENV2) == expr + + +def test_printmethod(): + class R(Abs): + def _sympyrepr(self, printer): + return "foo(%s)" % printer._print(self.args[0]) + assert srepr(R(x)) == "foo(Symbol('x'))" + + +def test_Add(): + sT(x + y, "Add(Symbol('x'), Symbol('y'))") + assert srepr(x**2 + 1, order='lex') == "Add(Pow(Symbol('x'), Integer(2)), Integer(1))" + assert srepr(x**2 + 1, order='old') == "Add(Integer(1), Pow(Symbol('x'), Integer(2)))" + assert srepr(sympify('x + 3 - 2', evaluate=False), order='none') == "Add(Symbol('x'), Integer(3), Mul(Integer(-1), Integer(2)))" + + +def test_more_than_255_args_issue_10259(): + from sympy.core.add import Add + from sympy.core.mul import Mul + for op in (Add, Mul): + expr = op(*symbols('x:256')) + assert eval(srepr(expr)) == expr + + +def test_Function(): + sT(Function("f")(x), "Function('f')(Symbol('x'))") + # test unapplied Function + sT(Function('f'), "Function('f')") + + sT(sin(x), "sin(Symbol('x'))") + sT(sin, "sin") + + +def test_Heaviside(): + sT(Heaviside(x), "Heaviside(Symbol('x'))") + sT(Heaviside(x, 1), "Heaviside(Symbol('x'), Integer(1))") + + +def test_Geometry(): + sT(Point(0, 0), "Point2D(Integer(0), Integer(0))") + sT(Ellipse(Point(0, 0), 5, 1), + "Ellipse(Point2D(Integer(0), Integer(0)), Integer(5), Integer(1))") + # TODO more tests + + +def test_Singletons(): + sT(S.Catalan, 'Catalan') + sT(S.ComplexInfinity, 'zoo') + sT(S.EulerGamma, 'EulerGamma') + sT(S.Exp1, 'E') + sT(S.GoldenRatio, 'GoldenRatio') + sT(S.TribonacciConstant, 'TribonacciConstant') + sT(S.Half, 'Rational(1, 2)') + sT(S.ImaginaryUnit, 'I') + sT(S.Infinity, 'oo') + sT(S.NaN, 'nan') + sT(S.NegativeInfinity, '-oo') + sT(S.NegativeOne, 'Integer(-1)') + sT(S.One, 'Integer(1)') + sT(S.Pi, 'pi') + sT(S.Zero, 'Integer(0)') + sT(S.Complexes, 'Complexes') + sT(S.EmptySequence, 'EmptySequence') + sT(S.EmptySet, 'EmptySet') + # sT(S.IdentityFunction, 'Lambda(_x, _x)') + sT(S.Naturals, 'Naturals') + sT(S.Naturals0, 'Naturals0') + sT(S.Rationals, 'Rationals') + sT(S.Reals, 'Reals') + sT(S.UniversalSet, 'UniversalSet') + + +def test_Integer(): + sT(Integer(4), "Integer(4)") + + +def test_list(): + sT([x, Integer(4)], "[Symbol('x'), Integer(4)]") + + +def test_Matrix(): + for cls, name in [(Matrix, "MutableDenseMatrix"), (ImmutableDenseMatrix, "ImmutableDenseMatrix")]: + sT(cls([[x**+1, 1], [y, x + y]]), + "%s([[Symbol('x'), Integer(1)], [Symbol('y'), Add(Symbol('x'), Symbol('y'))]])" % name) + + sT(cls(), "%s([])" % name) + + sT(cls([[x**+1, 1], [y, x + y]]), "%s([[Symbol('x'), Integer(1)], [Symbol('y'), Add(Symbol('x'), Symbol('y'))]])" % name) + + +def test_empty_Matrix(): + sT(ones(0, 3), "MutableDenseMatrix(0, 3, [])") + sT(ones(4, 0), "MutableDenseMatrix(4, 0, [])") + sT(ones(0, 0), "MutableDenseMatrix([])") + + +def test_Rational(): + sT(Rational(1, 3), "Rational(1, 3)") + sT(Rational(-1, 3), "Rational(-1, 3)") + + +def test_Float(): + sT(Float('1.23', dps=3), "Float('1.22998', precision=13)") + sT(Float('1.23456789', dps=9), "Float('1.23456788994', precision=33)") + sT(Float('1.234567890123456789', dps=19), + "Float('1.234567890123456789013', precision=66)") + sT(Float('0.60038617995049726', dps=15), + "Float('0.60038617995049726', precision=53)") + + sT(Float('1.23', precision=13), "Float('1.22998', precision=13)") + sT(Float('1.23456789', precision=33), + "Float('1.23456788994', precision=33)") + sT(Float('1.234567890123456789', precision=66), + "Float('1.234567890123456789013', precision=66)") + sT(Float('0.60038617995049726', precision=53), + "Float('0.60038617995049726', precision=53)") + + sT(Float('0.60038617995049726', 15), + "Float('0.60038617995049726', precision=53)") + + +def test_Symbol(): + sT(x, "Symbol('x')") + sT(y, "Symbol('y')") + sT(Symbol('x', negative=True), "Symbol('x', negative=True)") + + +def test_Symbol_two_assumptions(): + x = Symbol('x', negative=0, integer=1) + # order could vary + s1 = "Symbol('x', integer=True, negative=False)" + s2 = "Symbol('x', negative=False, integer=True)" + assert srepr(x) in (s1, s2) + assert eval(srepr(x), ENV) == x + + +def test_Symbol_no_special_commutative_treatment(): + sT(Symbol('x'), "Symbol('x')") + sT(Symbol('x', commutative=False), "Symbol('x', commutative=False)") + sT(Symbol('x', commutative=0), "Symbol('x', commutative=False)") + sT(Symbol('x', commutative=True), "Symbol('x', commutative=True)") + sT(Symbol('x', commutative=1), "Symbol('x', commutative=True)") + + +def test_Wild(): + sT(Wild('x', even=True), "Wild('x', even=True)") + + +def test_Dummy(): + d = Dummy('d') + sT(d, "Dummy('d', dummy_index=%s)" % str(d.dummy_index)) + + +def test_Dummy_assumption(): + d = Dummy('d', nonzero=True) + assert d == eval(srepr(d)) + s1 = "Dummy('d', dummy_index=%s, nonzero=True)" % str(d.dummy_index) + s2 = "Dummy('d', nonzero=True, dummy_index=%s)" % str(d.dummy_index) + assert srepr(d) in (s1, s2) + + +def test_Dummy_from_Symbol(): + # should not get the full dictionary of assumptions + n = Symbol('n', integer=True) + d = n.as_dummy() + assert srepr(d + ) == "Dummy('n', dummy_index=%s)" % str(d.dummy_index) + + +def test_tuple(): + sT((x,), "(Symbol('x'),)") + sT((x, y), "(Symbol('x'), Symbol('y'))") + + +def test_WildFunction(): + sT(WildFunction('w'), "WildFunction('w')") + + +def test_settins(): + raises(TypeError, lambda: srepr(x, method="garbage")) + + +def test_Mul(): + sT(3*x**3*y, "Mul(Integer(3), Pow(Symbol('x'), Integer(3)), Symbol('y'))") + assert srepr(3*x**3*y, order='old') == "Mul(Integer(3), Symbol('y'), Pow(Symbol('x'), Integer(3)))" + assert srepr(sympify('(x+4)*2*x*7', evaluate=False), order='none') == "Mul(Add(Symbol('x'), Integer(4)), Integer(2), Symbol('x'), Integer(7))" + + +def test_AlgebraicNumber(): + a = AlgebraicNumber(sqrt(2)) + sT(a, "AlgebraicNumber(Pow(Integer(2), Rational(1, 2)), [Integer(1), Integer(0)])") + a = AlgebraicNumber(root(-2, 3)) + sT(a, "AlgebraicNumber(Pow(Integer(-2), Rational(1, 3)), [Integer(1), Integer(0)])") + + +def test_PolyRing(): + assert srepr(ring("x", ZZ, lex)[0]) == "PolyRing((Symbol('x'),), ZZ, lex)" + assert srepr(ring("x,y", QQ, grlex)[0]) == "PolyRing((Symbol('x'), Symbol('y')), QQ, grlex)" + assert srepr(ring("x,y,z", ZZ["t"], lex)[0]) == "PolyRing((Symbol('x'), Symbol('y'), Symbol('z')), ZZ[t], lex)" + + +def test_FracField(): + assert srepr(field("x", ZZ, lex)[0]) == "FracField((Symbol('x'),), ZZ, lex)" + assert srepr(field("x,y", QQ, grlex)[0]) == "FracField((Symbol('x'), Symbol('y')), QQ, grlex)" + assert srepr(field("x,y,z", ZZ["t"], lex)[0]) == "FracField((Symbol('x'), Symbol('y'), Symbol('z')), ZZ[t], lex)" + + +def test_PolyElement(): + R, x, y = ring("x,y", ZZ) + assert srepr(3*x**2*y + 1) == "PolyElement(PolyRing((Symbol('x'), Symbol('y')), ZZ, lex), [((2, 1), 3), ((0, 0), 1)])" + + +def test_FracElement(): + F, x, y = field("x,y", ZZ) + assert srepr((3*x**2*y + 1)/(x - y**2)) == "FracElement(FracField((Symbol('x'), Symbol('y')), ZZ, lex), [((2, 1), 3), ((0, 0), 1)], [((1, 0), 1), ((0, 2), -1)])" + + +def test_FractionField(): + assert srepr(QQ.frac_field(x)) == \ + "FractionField(FracField((Symbol('x'),), QQ, lex))" + assert srepr(QQ.frac_field(x, y, order=grlex)) == \ + "FractionField(FracField((Symbol('x'), Symbol('y')), QQ, grlex))" + + +def test_PolynomialRingBase(): + assert srepr(ZZ.old_poly_ring(x)) == \ + "GlobalPolynomialRing(ZZ, Symbol('x'))" + assert srepr(ZZ[x].old_poly_ring(y)) == \ + "GlobalPolynomialRing(ZZ[x], Symbol('y'))" + assert srepr(QQ.frac_field(x).old_poly_ring(y)) == \ + "GlobalPolynomialRing(FractionField(FracField((Symbol('x'),), QQ, lex)), Symbol('y'))" + + +def test_DMP(): + p1 = DMP([1, 2], ZZ) + p2 = ZZ.old_poly_ring(x)([1, 2]) + if GROUND_TYPES != 'flint': + assert srepr(p1) == "DMP_Python([1, 2], ZZ)" + assert srepr(p2) == "DMP_Python([1, 2], ZZ)" + else: + assert srepr(p1) == "DUP_Flint([1, 2], ZZ)" + assert srepr(p2) == "DUP_Flint([1, 2], ZZ)" + + +def test_FiniteExtension(): + assert srepr(FiniteExtension(Poly(x**2 + 1, x))) == \ + "FiniteExtension(Poly(x**2 + 1, x, domain='ZZ'))" + + +def test_ExtensionElement(): + A = FiniteExtension(Poly(x**2 + 1, x)) + if GROUND_TYPES != 'flint': + ans = "ExtElem(DMP_Python([1, 0], ZZ), FiniteExtension(Poly(x**2 + 1, x, domain='ZZ')))" + else: + ans = "ExtElem(DUP_Flint([1, 0], ZZ), FiniteExtension(Poly(x**2 + 1, x, domain='ZZ')))" + assert srepr(A.generator) == ans + +def test_BooleanAtom(): + assert srepr(true) == "true" + assert srepr(false) == "false" + + +def test_Integers(): + sT(S.Integers, "Integers") + + +def test_Naturals(): + sT(S.Naturals, "Naturals") + + +def test_Naturals0(): + sT(S.Naturals0, "Naturals0") + + +def test_Reals(): + sT(S.Reals, "Reals") + + +def test_matrix_expressions(): + n = symbols('n', integer=True) + A = MatrixSymbol("A", n, n) + B = MatrixSymbol("B", n, n) + sT(A, "MatrixSymbol(Str('A'), Symbol('n', integer=True), Symbol('n', integer=True))") + sT(A*B, "MatMul(MatrixSymbol(Str('A'), Symbol('n', integer=True), Symbol('n', integer=True)), MatrixSymbol(Str('B'), Symbol('n', integer=True), Symbol('n', integer=True)))") + sT(A + B, "MatAdd(MatrixSymbol(Str('A'), Symbol('n', integer=True), Symbol('n', integer=True)), MatrixSymbol(Str('B'), Symbol('n', integer=True), Symbol('n', integer=True)))") + + +def test_Cycle(): + # FIXME: sT fails because Cycle is not immutable and calling srepr(Cycle(1, 2)) + # adds keys to the Cycle dict (GH-17661) + #import_stmt = "from sympy.combinatorics import Cycle" + #sT(Cycle(1, 2), "Cycle(1, 2)", import_stmt) + assert srepr(Cycle(1, 2)) == "Cycle(1, 2)" + + +def test_Permutation(): + import_stmt = "from sympy.combinatorics import Permutation" + sT(Permutation(1, 2)(3, 4), "Permutation([0, 2, 1, 4, 3])", import_stmt, perm_cyclic=False) + sT(Permutation(1, 2)(3, 4), "Permutation(1, 2)(3, 4)", import_stmt, perm_cyclic=True) + + with warns_deprecated_sympy(): + old_print_cyclic = Permutation.print_cyclic + Permutation.print_cyclic = False + sT(Permutation(1, 2)(3, 4), "Permutation([0, 2, 1, 4, 3])", import_stmt) + Permutation.print_cyclic = old_print_cyclic + +def test_dict(): + from sympy.abc import x, y, z + d = {} + assert srepr(d) == "{}" + d = {x: y} + assert srepr(d) == "{Symbol('x'): Symbol('y')}" + d = {x: y, y: z} + assert srepr(d) in ( + "{Symbol('x'): Symbol('y'), Symbol('y'): Symbol('z')}", + "{Symbol('y'): Symbol('z'), Symbol('x'): Symbol('y')}", + ) + d = {x: {y: z}} + assert srepr(d) == "{Symbol('x'): {Symbol('y'): Symbol('z')}}" + +def test_set(): + from sympy.abc import x, y + s = set() + assert srepr(s) == "set()" + s = {x, y} + assert srepr(s) in ("{Symbol('x'), Symbol('y')}", "{Symbol('y'), Symbol('x')}") + +def test_Predicate(): + sT(Q.even, "Q.even") + +def test_AppliedPredicate(): + sT(Q.even(Symbol('z')), "AppliedPredicate(Q.even, Symbol('z'))") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rust.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rust.py new file mode 100644 index 0000000000000000000000000000000000000000..c81d592faca0d4a31e5a9618a48d67cb19ca94d8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_rust.py @@ -0,0 +1,363 @@ +from sympy.core import (S, pi, oo, symbols, Rational, Integer, + GoldenRatio, EulerGamma, Catalan, Lambda, Dummy, + Eq, Ne, Le, Lt, Gt, Ge, Mod) +from sympy.functions import (Piecewise, sin, cos, Abs, exp, ceiling, sqrt, + sign, floor) +from sympy.logic import ITE +from sympy.testing.pytest import raises +from sympy.utilities.lambdify import implemented_function +from sympy.tensor import IndexedBase, Idx +from sympy.matrices import MatrixSymbol, SparseMatrix, Matrix + +from sympy.printing.codeprinter import rust_code + +x, y, z = symbols('x,y,z', integer=False, real=True) +k, m, n = symbols('k,m,n', integer=True) + + +def test_Integer(): + assert rust_code(Integer(42)) == "42" + assert rust_code(Integer(-56)) == "-56" + + +def test_Relational(): + assert rust_code(Eq(x, y)) == "x == y" + assert rust_code(Ne(x, y)) == "x != y" + assert rust_code(Le(x, y)) == "x <= y" + assert rust_code(Lt(x, y)) == "x < y" + assert rust_code(Gt(x, y)) == "x > y" + assert rust_code(Ge(x, y)) == "x >= y" + + +def test_Rational(): + assert rust_code(Rational(3, 7)) == "3_f64/7.0" + assert rust_code(Rational(18, 9)) == "2" + assert rust_code(Rational(3, -7)) == "-3_f64/7.0" + assert rust_code(Rational(-3, -7)) == "3_f64/7.0" + assert rust_code(x + Rational(3, 7)) == "x + 3_f64/7.0" + assert rust_code(Rational(3, 7)*x) == "(3_f64/7.0)*x" + + +def test_basic_ops(): + assert rust_code(x + y) == "x + y" + assert rust_code(x - y) == "x - y" + assert rust_code(x * y) == "x*y" + assert rust_code(x / y) == "x*y.recip()" + assert rust_code(-x) == "-x" + assert rust_code(2 * x) == "2.0*x" + assert rust_code(y + 2) == "y + 2.0" + assert rust_code(x + n) == "n as f64 + x" + +def test_printmethod(): + class fabs(Abs): + def _rust_code(self, printer): + return "%s.fabs()" % printer._print(self.args[0]) + assert rust_code(fabs(x)) == "x.fabs()" + a = MatrixSymbol("a", 1, 3) + assert rust_code(a[0,0]) == 'a[0]' + + +def test_Functions(): + assert rust_code(sin(x) ** cos(x)) == "x.sin().powf(x.cos())" + assert rust_code(abs(x)) == "x.abs()" + assert rust_code(ceiling(x)) == "x.ceil()" + assert rust_code(floor(x)) == "x.floor()" + + # Automatic rewrite + assert rust_code(Mod(x, 3)) == 'x - 3.0*((1_f64/3.0)*x).floor()' + + +def test_Pow(): + assert rust_code(1/x) == "x.recip()" + assert rust_code(x**-1) == rust_code(x**-1.0) == "x.recip()" + assert rust_code(sqrt(x)) == "x.sqrt()" + assert rust_code(x**S.Half) == rust_code(x**0.5) == "x.sqrt()" + + assert rust_code(1/sqrt(x)) == "x.sqrt().recip()" + assert rust_code(x**-S.Half) == rust_code(x**-0.5) == "x.sqrt().recip()" + + assert rust_code(1/pi) == "PI.recip()" + assert rust_code(pi**-1) == rust_code(pi**-1.0) == "PI.recip()" + assert rust_code(pi**-0.5) == "PI.sqrt().recip()" + + assert rust_code(x**Rational(1, 3)) == "x.cbrt()" + assert rust_code(2**x) == "x.exp2()" + assert rust_code(exp(x)) == "x.exp()" + assert rust_code(x**3) == "x.powi(3)" + assert rust_code(x**(y**3)) == "x.powf(y.powi(3))" + assert rust_code(x**Rational(2, 3)) == "x.powf(2_f64/3.0)" + + g = implemented_function('g', Lambda(x, 2*x)) + assert rust_code(1/(g(x)*3.5)**(x - y**x)/(x**2 + y)) == \ + "(3.5*2.0*x).powf(-x + y.powf(x))/(x.powi(2) + y)" + _cond_cfunc = [(lambda base, exp: exp.is_integer, "dpowi", 1), + (lambda base, exp: not exp.is_integer, "pow", 1)] + assert rust_code(x**3, user_functions={'Pow': _cond_cfunc}) == 'x.dpowi(3)' + assert rust_code(x**3.2, user_functions={'Pow': _cond_cfunc}) == 'x.pow(3.2)' + + +def test_constants(): + assert rust_code(pi) == "PI" + assert rust_code(oo) == "INFINITY" + assert rust_code(S.Infinity) == "INFINITY" + assert rust_code(-oo) == "NEG_INFINITY" + assert rust_code(S.NegativeInfinity) == "NEG_INFINITY" + assert rust_code(S.NaN) == "NAN" + assert rust_code(exp(1)) == "E" + assert rust_code(S.Exp1) == "E" + + +def test_constants_other(): + assert rust_code(2*GoldenRatio) == "const GoldenRatio: f64 = %s;\n2.0*GoldenRatio" % GoldenRatio.evalf(17) + assert rust_code( + 2*Catalan) == "const Catalan: f64 = %s;\n2.0*Catalan" % Catalan.evalf(17) + assert rust_code(2*EulerGamma) == "const EulerGamma: f64 = %s;\n2.0*EulerGamma" % EulerGamma.evalf(17) + + +def test_boolean(): + assert rust_code(True) == "true" + assert rust_code(S.true) == "true" + assert rust_code(False) == "false" + assert rust_code(S.false) == "false" + assert rust_code(k & m) == "k && m" + assert rust_code(k | m) == "k || m" + assert rust_code(~k) == "!k" + assert rust_code(k & m & n) == "k && m && n" + assert rust_code(k | m | n) == "k || m || n" + assert rust_code((k & m) | n) == "n || k && m" + assert rust_code((k | m) & n) == "n && (k || m)" + + +def test_Piecewise(): + expr = Piecewise((x, x < 1), (x + 2, True)) + assert rust_code(expr) == ( + "if (x < 1.0) {\n" + " x\n" + "} else {\n" + " x + 2.0\n" + "}") + assert rust_code(expr, assign_to="r") == ( + "r = if (x < 1.0) {\n" + " x\n" + "} else {\n" + " x + 2.0\n" + "};") + assert rust_code(expr, assign_to="r", inline=True) == ( + "r = if (x < 1.0) { x } else { x + 2.0 };") + expr = Piecewise((x, x < 1), (x + 1, x < 5), (x + 2, True)) + assert rust_code(expr, inline=True) == ( + "if (x < 1.0) { x } else if (x < 5.0) { x + 1.0 } else { x + 2.0 }") + assert rust_code(expr, assign_to="r", inline=True) == ( + "r = if (x < 1.0) { x } else if (x < 5.0) { x + 1.0 } else { x + 2.0 };") + assert rust_code(expr, assign_to="r") == ( + "r = if (x < 1.0) {\n" + " x\n" + "} else if (x < 5.0) {\n" + " x + 1.0\n" + "} else {\n" + " x + 2.0\n" + "};") + expr = 2*Piecewise((x, x < 1), (x + 1, x < 5), (x + 2, True)) + assert rust_code(expr, inline=True) == ( + "2.0*if (x < 1.0) { x } else if (x < 5.0) { x + 1.0 } else { x + 2.0 }") + expr = 2*Piecewise((x, x < 1), (x + 1, x < 5), (x + 2, True)) - 42 + assert rust_code(expr, inline=True) == ( + "2.0*if (x < 1.0) { x } else if (x < 5.0) { x + 1.0 } else { x + 2.0 } - 42.0") + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x**2, x > 1), (sin(x), x > 0)) + raises(ValueError, lambda: rust_code(expr)) + + +def test_dereference_printing(): + expr = x + y + sin(z) + z + assert rust_code(expr, dereference=[z]) == "x + y + (*z) + (*z).sin()" + + +def test_sign(): + expr = sign(x) * y + assert rust_code(expr) == "y*(if (x == 0.0) { 0.0 } else { (x).signum() }) as f64" + assert rust_code(expr, assign_to='r') == "r = y*(if (x == 0.0) { 0.0 } else { (x).signum() }) as f64;" + + expr = sign(x + y) + 42 + assert rust_code(expr) == "(if (x + y == 0.0) { 0.0 } else { (x + y).signum() }) + 42" + assert rust_code(expr, assign_to='r') == "r = (if (x + y == 0.0) { 0.0 } else { (x + y).signum() }) + 42;" + + expr = sign(cos(x)) + assert rust_code(expr) == "(if (x.cos() == 0.0) { 0.0 } else { (x.cos()).signum() })" + + +def test_reserved_words(): + + x, y = symbols("x if") + + expr = sin(y) + assert rust_code(expr) == "if_.sin()" + assert rust_code(expr, dereference=[y]) == "(*if_).sin()" + assert rust_code(expr, reserved_word_suffix='_unreserved') == "if_unreserved.sin()" + + with raises(ValueError): + rust_code(expr, error_on_reserved=True) + + +def test_ITE(): + ekpr = ITE(k < 1, m, n) + assert rust_code(ekpr) == ( + "if (k < 1) {\n" + " m\n" + "} else {\n" + " n\n" + "}") + + +def test_Indexed(): + n, m, o = symbols('n m o', integer=True) + i, j, k = Idx('i', n), Idx('j', m), Idx('k', o) + + x = IndexedBase('x')[j] + assert rust_code(x) == "x[j]" + + A = IndexedBase('A')[i, j] + assert rust_code(A) == "A[m*i + j]" + + B = IndexedBase('B')[i, j, k] + assert rust_code(B) == "B[m*o*i + o*j + k]" + + +def test_dummy_loops(): + i, m = symbols('i m', integer=True, cls=Dummy) + x = IndexedBase('x') + y = IndexedBase('y') + i = Idx(i, m) + + assert rust_code(x[i], assign_to=y[i]) == ( + "for i in 0..m {\n" + " y[i] = x[i];\n" + "}") + + +def test_loops(): + m, n = symbols('m n', integer=True) + A = IndexedBase('A') + x = IndexedBase('x') + y = IndexedBase('y') + z = IndexedBase('z') + i = Idx('i', m) + j = Idx('j', n) + + assert rust_code(A[i, j]*x[j], assign_to=y[i]) == ( + "for i in 0..m {\n" + " y[i] = 0;\n" + "}\n" + "for i in 0..m {\n" + " for j in 0..n {\n" + " y[i] = A[n*i + j]*x[j] + y[i];\n" + " }\n" + "}") + + assert rust_code(A[i, j]*x[j] + x[i] + z[i], assign_to=y[i]) == ( + "for i in 0..m {\n" + " y[i] = x[i] + z[i];\n" + "}\n" + "for i in 0..m {\n" + " for j in 0..n {\n" + " y[i] = A[n*i + j]*x[j] + y[i];\n" + " }\n" + "}") + + +def test_loops_multiple_contractions(): + n, m, o, p = symbols('n m o p', integer=True) + a = IndexedBase('a') + b = IndexedBase('b') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + k = Idx('k', o) + l = Idx('l', p) + + assert rust_code(b[j, k, l]*a[i, j, k, l], assign_to=y[i]) == ( + "for i in 0..m {\n" + " y[i] = 0;\n" + "}\n" + "for i in 0..m {\n" + " for j in 0..n {\n" + " for k in 0..o {\n" + " for l in 0..p {\n" + " y[i] = a[%s]*b[%s] + y[i];\n" % (i*n*o*p + j*o*p + k*p + l, j*o*p + k*p + l) +\ + " }\n" + " }\n" + " }\n" + "}") + + +def test_loops_addfactor(): + m, n, o, p = symbols('m n o p', integer=True) + a = IndexedBase('a') + b = IndexedBase('b') + c = IndexedBase('c') + y = IndexedBase('y') + i = Idx('i', m) + j = Idx('j', n) + k = Idx('k', o) + l = Idx('l', p) + + code = rust_code((a[i, j, k, l] + b[i, j, k, l])*c[j, k, l], assign_to=y[i]) + assert code == ( + "for i in 0..m {\n" + " y[i] = 0;\n" + "}\n" + "for i in 0..m {\n" + " for j in 0..n {\n" + " for k in 0..o {\n" + " for l in 0..p {\n" + " y[i] = (a[%s] + b[%s])*c[%s] + y[i];\n" % (i*n*o*p + j*o*p + k*p + l, i*n*o*p + j*o*p + k*p + l, j*o*p + k*p + l) +\ + " }\n" + " }\n" + " }\n" + "}") + + +def test_settings(): + raises(TypeError, lambda: rust_code(sin(x), method="garbage")) + + +def test_inline_function(): + x = symbols('x') + g = implemented_function('g', Lambda(x, 2*x)) + assert rust_code(g(x)) == "2*x" + + g = implemented_function('g', Lambda(x, 2*x/Catalan)) + assert rust_code(g(x)) == ( + "const Catalan: f64 = %s;\n2.0*x/Catalan" % Catalan.evalf(17)) + + A = IndexedBase('A') + i = Idx('i', symbols('n', integer=True)) + g = implemented_function('g', Lambda(x, x*(1 + x)*(2 + x))) + assert rust_code(g(A[i]), assign_to=A[i]) == ( + "for i in 0..n {\n" + " A[i] = (A[i] + 1)*(A[i] + 2)*A[i];\n" + "}") + + +def test_user_functions(): + x = symbols('x', integer=False) + n = symbols('n', integer=True) + custom_functions = { + "ceiling": "ceil", + "Abs": [(lambda x: not x.is_integer, "fabs", 4), (lambda x: x.is_integer, "abs", 4)], + } + assert rust_code(ceiling(x), user_functions=custom_functions) == "x.ceil()" + assert rust_code(Abs(x), user_functions=custom_functions) == "fabs(x)" + assert rust_code(Abs(n), user_functions=custom_functions) == "abs(n)" + + +def test_matrix(): + assert rust_code(Matrix([1, 2, 3])) == '[1, 2, 3]' + with raises(ValueError): + rust_code(Matrix([[1, 2, 3]])) + + +def test_sparse_matrix(): + # gh-15791 + with raises(NotImplementedError): + rust_code(SparseMatrix([[1, 2, 3]])) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_smtlib.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_smtlib.py new file mode 100644 index 0000000000000000000000000000000000000000..48ff3d432d9042bf178f4e52dc46c787059937a3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_smtlib.py @@ -0,0 +1,553 @@ +import contextlib +import itertools +import re +import typing +from enum import Enum +from typing import Callable + +import sympy +from sympy import Add, Implies, sqrt +from sympy.core import Mul, Pow +from sympy.core import (S, pi, symbols, Function, Rational, Integer, + Symbol, Eq, Ne, Le, Lt, Gt, Ge) +from sympy.functions import Piecewise, exp, sin, cos +from sympy.assumptions.ask import Q +from sympy.printing.smtlib import smtlib_code +from sympy.testing.pytest import raises, Failed + +x, y, z = symbols('x,y,z') + + +class _W(Enum): + DEFAULTING_TO_FLOAT = re.compile("Could not infer type of `.+`. Defaulting to float.", re.IGNORECASE) + WILL_NOT_DECLARE = re.compile("Non-Symbol/Function `.+` will not be declared.", re.IGNORECASE) + WILL_NOT_ASSERT = re.compile("Non-Boolean expression `.+` will not be asserted. Converting to SMTLib verbatim.", re.IGNORECASE) + + +@contextlib.contextmanager +def _check_warns(expected: typing.Iterable[_W]): + warns: typing.List[str] = [] + log_warn = warns.append + yield log_warn + + errors = [] + for i, (w, e) in enumerate(itertools.zip_longest(warns, expected)): + if not e: + errors += [f"[{i}] Received unexpected warning `{w}`."] + elif not w: + errors += [f"[{i}] Did not receive expected warning `{e.name}`."] + elif not e.value.match(w): + errors += [f"[{i}] Warning `{w}` does not match expected {e.name}."] + + if errors: raise Failed('\n'.join(errors)) + + +def test_Integer(): + with _check_warns([_W.WILL_NOT_ASSERT] * 2) as w: + assert smtlib_code(Integer(67), log_warn=w) == "67" + assert smtlib_code(Integer(-1), log_warn=w) == "-1" + with _check_warns([]) as w: + assert smtlib_code(Integer(67)) == "67" + assert smtlib_code(Integer(-1)) == "-1" + + +def test_Rational(): + with _check_warns([_W.WILL_NOT_ASSERT] * 4) as w: + assert smtlib_code(Rational(3, 7), log_warn=w) == "(/ 3 7)" + assert smtlib_code(Rational(18, 9), log_warn=w) == "2" + assert smtlib_code(Rational(3, -7), log_warn=w) == "(/ -3 7)" + assert smtlib_code(Rational(-3, -7), log_warn=w) == "(/ 3 7)" + + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT] * 2) as w: + assert smtlib_code(x + Rational(3, 7), auto_declare=False, log_warn=w) == "(+ (/ 3 7) x)" + assert smtlib_code(Rational(3, 7) * x, log_warn=w) == "(declare-const x Real)\n" \ + "(* (/ 3 7) x)" + + +def test_Relational(): + with _check_warns([_W.DEFAULTING_TO_FLOAT] * 12) as w: + assert smtlib_code(Eq(x, y), auto_declare=False, log_warn=w) == "(assert (= x y))" + assert smtlib_code(Ne(x, y), auto_declare=False, log_warn=w) == "(assert (not (= x y)))" + assert smtlib_code(Le(x, y), auto_declare=False, log_warn=w) == "(assert (<= x y))" + assert smtlib_code(Lt(x, y), auto_declare=False, log_warn=w) == "(assert (< x y))" + assert smtlib_code(Gt(x, y), auto_declare=False, log_warn=w) == "(assert (> x y))" + assert smtlib_code(Ge(x, y), auto_declare=False, log_warn=w) == "(assert (>= x y))" + + +def test_AppliedBinaryRelation(): + with _check_warns([_W.DEFAULTING_TO_FLOAT] * 12) as w: + assert smtlib_code(Q.eq(x, y), auto_declare=False, log_warn=w) == "(assert (= x y))" + assert smtlib_code(Q.ne(x, y), auto_declare=False, log_warn=w) == "(assert (not (= x y)))" + assert smtlib_code(Q.lt(x, y), auto_declare=False, log_warn=w) == "(assert (< x y))" + assert smtlib_code(Q.le(x, y), auto_declare=False, log_warn=w) == "(assert (<= x y))" + assert smtlib_code(Q.gt(x, y), auto_declare=False, log_warn=w) == "(assert (> x y))" + assert smtlib_code(Q.ge(x, y), auto_declare=False, log_warn=w) == "(assert (>= x y))" + + raises(ValueError, lambda: smtlib_code(Q.complex(x), log_warn=w)) + + +def test_AppliedPredicate(): + with _check_warns([_W.DEFAULTING_TO_FLOAT] * 6) as w: + assert smtlib_code(Q.positive(x), auto_declare=False, log_warn=w) == "(assert (> x 0))" + assert smtlib_code(Q.negative(x), auto_declare=False, log_warn=w) == "(assert (< x 0))" + assert smtlib_code(Q.zero(x), auto_declare=False, log_warn=w) == "(assert (= x 0))" + assert smtlib_code(Q.nonpositive(x), auto_declare=False, log_warn=w) == "(assert (<= x 0))" + assert smtlib_code(Q.nonnegative(x), auto_declare=False, log_warn=w) == "(assert (>= x 0))" + assert smtlib_code(Q.nonzero(x), auto_declare=False, log_warn=w) == "(assert (not (= x 0)))" + +def test_Function(): + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(sin(x) ** cos(x), auto_declare=False, log_warn=w) == "(pow (sin x) (cos x))" + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + abs(x), + symbol_table={x: int, y: bool}, + known_types={int: "INTEGER_TYPE"}, + known_functions={sympy.Abs: "ABSOLUTE_VALUE_OF"}, + log_warn=w + ) == "(declare-const x INTEGER_TYPE)\n" \ + "(ABSOLUTE_VALUE_OF x)" + + my_fun1 = Function('f1') + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + my_fun1(x), + symbol_table={my_fun1: Callable[[bool], float]}, + log_warn=w + ) == "(declare-const x Bool)\n" \ + "(declare-fun f1 (Bool) Real)\n" \ + "(f1 x)" + + with _check_warns([]) as w: + assert smtlib_code( + my_fun1(x), + symbol_table={my_fun1: Callable[[bool], bool]}, + log_warn=w + ) == "(declare-const x Bool)\n" \ + "(declare-fun f1 (Bool) Bool)\n" \ + "(assert (f1 x))" + + assert smtlib_code( + Eq(my_fun1(x, z), y), + symbol_table={my_fun1: Callable[[int, bool], bool]}, + log_warn=w + ) == "(declare-const x Int)\n" \ + "(declare-const y Bool)\n" \ + "(declare-const z Bool)\n" \ + "(declare-fun f1 (Int Bool) Bool)\n" \ + "(assert (= (f1 x z) y))" + + assert smtlib_code( + Eq(my_fun1(x, z), y), + symbol_table={my_fun1: Callable[[int, bool], bool]}, + known_functions={my_fun1: "MY_KNOWN_FUN", Eq: '=='}, + log_warn=w + ) == "(declare-const x Int)\n" \ + "(declare-const y Bool)\n" \ + "(declare-const z Bool)\n" \ + "(assert (== (MY_KNOWN_FUN x z) y))" + + with _check_warns([_W.DEFAULTING_TO_FLOAT] * 3) as w: + assert smtlib_code( + Eq(my_fun1(x, z), y), + known_functions={my_fun1: "MY_KNOWN_FUN", Eq: '=='}, + log_warn=w + ) == "(declare-const x Real)\n" \ + "(declare-const y Real)\n" \ + "(declare-const z Real)\n" \ + "(assert (== (MY_KNOWN_FUN x z) y))" + + +def test_Pow(): + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(x ** 3, auto_declare=False, log_warn=w) == "(pow x 3)" + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(x ** (y ** 3), auto_declare=False, log_warn=w) == "(pow x (pow y 3))" + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(x ** Rational(2, 3), auto_declare=False, log_warn=w) == '(pow x (/ 2 3))' + + a = Symbol('a', integer=True) + b = Symbol('b', real=True) + c = Symbol('c') + + def g(x): return 2 * x + + # if x=1, y=2, then expr=2.333... + expr = 1 / (g(a) * 3.5) ** (a - b ** a) / (a ** 2 + b) + + with _check_warns([]) as w: + assert smtlib_code( + [ + Eq(a < 2, c), + Eq(b > a, c), + c & True, + Eq(expr, 2 + Rational(1, 3)) + ], + log_warn=w + ) == '(declare-const a Int)\n' \ + '(declare-const b Real)\n' \ + '(declare-const c Bool)\n' \ + '(assert (= (< a 2) c))\n' \ + '(assert (= (> b a) c))\n' \ + '(assert c)\n' \ + '(assert (= ' \ + '(* (pow (* 7.0 a) (+ (pow b a) (* -1 a))) (pow (+ b (pow a 2)) -1)) ' \ + '(/ 7 3)' \ + '))' + + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Mul(-2, c, Pow(Mul(b, b, evaluate=False), -1, evaluate=False), evaluate=False), + log_warn=w + ) == '(declare-const b Real)\n' \ + '(declare-const c Real)\n' \ + '(* -2 c (pow (* b b) -1))' + + +def test_basic_ops(): + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(x * y, auto_declare=False, log_warn=w) == "(* x y)" + + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(x + y, auto_declare=False, log_warn=w) == "(+ x y)" + + # with _check_warns([_SmtlibWarnings.DEFAULTING_TO_FLOAT, _SmtlibWarnings.DEFAULTING_TO_FLOAT, _SmtlibWarnings.WILL_NOT_ASSERT]) as w: + # todo: implement re-write, currently does '(+ x (* -1 y))' instead + # assert smtlib_code(x - y, auto_declare=False, log_warn=w) == "(- x y)" + + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(-x, auto_declare=False, log_warn=w) == "(* -1 x)" + + +def test_quantifier_extensions(): + from sympy.logic.boolalg import Boolean + from sympy import Interval, Tuple, sympify + + # start For-all quantifier class example + class ForAll(Boolean): + def _smtlib(self, printer): + bound_symbol_declarations = [ + printer._s_expr(sym.name, [ + printer._known_types[printer.symbol_table[sym]], + Interval(start, end) + ]) for sym, start, end in self.limits + ] + return printer._s_expr('forall', [ + printer._s_expr('', bound_symbol_declarations), + self.function + ]) + + @property + def bound_symbols(self): + return {s for s, _, _ in self.limits} + + @property + def free_symbols(self): + bound_symbol_names = {s.name for s in self.bound_symbols} + return { + s for s in self.function.free_symbols + if s.name not in bound_symbol_names + } + + def __new__(cls, *args): + limits = [sympify(a) for a in args if isinstance(a, (tuple, Tuple))] + function = [sympify(a) for a in args if isinstance(a, Boolean)] + assert len(limits) + len(function) == len(args) + assert len(function) == 1 + function = function[0] + + if isinstance(function, ForAll): return ForAll.__new__( + ForAll, *(limits + function.limits), function.function + ) + inst = Boolean.__new__(cls) + inst._args = tuple(limits + [function]) + inst.limits = limits + inst.function = function + return inst + + # end For-All Quantifier class example + + f = Function('f') + with _check_warns([_W.DEFAULTING_TO_FLOAT]) as w: + assert smtlib_code( + ForAll((x, -42, +21), Eq(f(x), f(x))), + symbol_table={f: Callable[[float], float]}, + log_warn=w + ) == '(assert (forall ( (x Real [-42, 21])) true))' + + with _check_warns([_W.DEFAULTING_TO_FLOAT] * 2) as w: + assert smtlib_code( + ForAll( + (x, -42, +21), (y, -100, 3), + Implies(Eq(x, y), Eq(f(x), f(y))) + ), + symbol_table={f: Callable[[float], float]}, + log_warn=w + ) == '(declare-fun f (Real) Real)\n' \ + '(assert (' \ + 'forall ( (x Real [-42, 21]) (y Real [-100, 3])) ' \ + '(=> (= x y) (= (f x) (f y)))' \ + '))' + + a = Symbol('a', integer=True) + b = Symbol('b', real=True) + c = Symbol('c') + + with _check_warns([]) as w: + assert smtlib_code( + ForAll( + (a, 2, 100), ForAll( + (b, 2, 100), + Implies(a < b, sqrt(a) < b) | c + )), + log_warn=w + ) == '(declare-const c Bool)\n' \ + '(assert (forall ( (a Int [2, 100]) (b Real [2, 100])) ' \ + '(or c (=> (< a b) (< (pow a (/ 1 2)) b)))' \ + '))' + + +def test_mix_number_mult_symbols(): + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + 1 / pi, + known_constants={pi: "MY_PI"}, + log_warn=w + ) == '(pow MY_PI -1)' + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + [ + Eq(pi, 3.14, evaluate=False), + 1 / pi, + ], + known_constants={pi: "MY_PI"}, + log_warn=w + ) == '(assert (= MY_PI 3.14))\n' \ + '(pow MY_PI -1)' + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Add(S.Zero, S.One, S.NegativeOne, S.Half, + S.Exp1, S.Pi, S.GoldenRatio, evaluate=False), + known_constants={ + S.Pi: 'p', S.GoldenRatio: 'g', + S.Exp1: 'e' + }, + known_functions={ + Add: 'plus', + exp: 'exp' + }, + precision=3, + log_warn=w + ) == '(plus 0 1 -1 (/ 1 2) (exp 1) p g)' + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Add(S.Zero, S.One, S.NegativeOne, S.Half, + S.Exp1, S.Pi, S.GoldenRatio, evaluate=False), + known_constants={ + S.Pi: 'p' + }, + known_functions={ + Add: 'plus', + exp: 'exp' + }, + precision=3, + log_warn=w + ) == '(plus 0 1 -1 (/ 1 2) (exp 1) p 1.62)' + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Add(S.Zero, S.One, S.NegativeOne, S.Half, + S.Exp1, S.Pi, S.GoldenRatio, evaluate=False), + known_functions={Add: 'plus'}, + precision=3, + log_warn=w + ) == '(plus 0 1 -1 (/ 1 2) 2.72 3.14 1.62)' + + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Add(S.Zero, S.One, S.NegativeOne, S.Half, + S.Exp1, S.Pi, S.GoldenRatio, evaluate=False), + known_constants={S.Exp1: 'e'}, + known_functions={Add: 'plus'}, + precision=3, + log_warn=w + ) == '(plus 0 1 -1 (/ 1 2) e 3.14 1.62)' + + +def test_boolean(): + with _check_warns([]) as w: + assert smtlib_code(x & y, log_warn=w) == '(declare-const x Bool)\n' \ + '(declare-const y Bool)\n' \ + '(assert (and x y))' + assert smtlib_code(x | y, log_warn=w) == '(declare-const x Bool)\n' \ + '(declare-const y Bool)\n' \ + '(assert (or x y))' + assert smtlib_code(~x, log_warn=w) == '(declare-const x Bool)\n' \ + '(assert (not x))' + assert smtlib_code(x & y & z, log_warn=w) == '(declare-const x Bool)\n' \ + '(declare-const y Bool)\n' \ + '(declare-const z Bool)\n' \ + '(assert (and x y z))' + + with _check_warns([_W.DEFAULTING_TO_FLOAT]) as w: + assert smtlib_code((x & ~y) | (z > 3), log_warn=w) == '(declare-const x Bool)\n' \ + '(declare-const y Bool)\n' \ + '(declare-const z Real)\n' \ + '(assert (or (> z 3) (and x (not y))))' + + f = Function('f') + g = Function('g') + h = Function('h') + with _check_warns([_W.DEFAULTING_TO_FLOAT]) as w: + assert smtlib_code( + [Gt(f(x), y), + Lt(y, g(z))], + symbol_table={ + f: Callable[[bool], int], g: Callable[[bool], int], + }, log_warn=w + ) == '(declare-const x Bool)\n' \ + '(declare-const y Real)\n' \ + '(declare-const z Bool)\n' \ + '(declare-fun f (Bool) Int)\n' \ + '(declare-fun g (Bool) Int)\n' \ + '(assert (> (f x) y))\n' \ + '(assert (< y (g z)))' + + with _check_warns([]) as w: + assert smtlib_code( + [Eq(f(x), y), + Lt(y, g(z))], + symbol_table={ + f: Callable[[bool], int], g: Callable[[bool], int], + }, log_warn=w + ) == '(declare-const x Bool)\n' \ + '(declare-const y Int)\n' \ + '(declare-const z Bool)\n' \ + '(declare-fun f (Bool) Int)\n' \ + '(declare-fun g (Bool) Int)\n' \ + '(assert (= (f x) y))\n' \ + '(assert (< y (g z)))' + + with _check_warns([]) as w: + assert smtlib_code( + [Eq(f(x), y), + Eq(g(f(x)), z), + Eq(h(g(f(x))), x)], + symbol_table={ + f: Callable[[float], int], + g: Callable[[int], bool], + h: Callable[[bool], float] + }, + log_warn=w + ) == '(declare-const x Real)\n' \ + '(declare-const y Int)\n' \ + '(declare-const z Bool)\n' \ + '(declare-fun f (Real) Int)\n' \ + '(declare-fun g (Int) Bool)\n' \ + '(declare-fun h (Bool) Real)\n' \ + '(assert (= (f x) y))\n' \ + '(assert (= (g (f x)) z))\n' \ + '(assert (= (h (g (f x))) x))' + + +# todo: make smtlib_code support arrays +# def test_containers(): +# assert julia_code([1, 2, 3, [4, 5, [6, 7]], 8, [9, 10], 11]) == \ +# "Any[1, 2, 3, Any[4, 5, Any[6, 7]], 8, Any[9, 10], 11]" +# assert julia_code((1, 2, (3, 4))) == "(1, 2, (3, 4))" +# assert julia_code([1]) == "Any[1]" +# assert julia_code((1,)) == "(1,)" +# assert julia_code(Tuple(*[1, 2, 3])) == "(1, 2, 3)" +# assert julia_code((1, x * y, (3, x ** 2))) == "(1, x .* y, (3, x .^ 2))" +# # scalar, matrix, empty matrix and empty list +# assert julia_code((1, eye(3), Matrix(0, 0, []), [])) == "(1, [1 0 0;\n0 1 0;\n0 0 1], zeros(0, 0), Any[])" + +def test_smtlib_piecewise(): + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Piecewise((x, x < 1), + (x ** 2, True)), + auto_declare=False, + log_warn=w + ) == '(ite (< x 1) x (pow x 2))' + + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code( + Piecewise((x ** 2, x < 1), + (x ** 3, x < 2), + (x ** 4, x < 3), + (x ** 5, True)), + auto_declare=False, + log_warn=w + ) == '(ite (< x 1) (pow x 2) ' \ + '(ite (< x 2) (pow x 3) ' \ + '(ite (< x 3) (pow x 4) ' \ + '(pow x 5))))' + + # Check that Piecewise without a True (default) condition error + expr = Piecewise((x, x < 1), (x ** 2, x > 1), (sin(x), x > 0)) + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + raises(AssertionError, lambda: smtlib_code(expr, log_warn=w)) + + +def test_smtlib_piecewise_times_const(): + pw = Piecewise((x, x < 1), (x ** 2, True)) + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(2 * pw, log_warn=w) == '(declare-const x Real)\n(* 2 (ite (< x 1) x (pow x 2)))' + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(pw / x, log_warn=w) == '(declare-const x Real)\n(* (pow x -1) (ite (< x 1) x (pow x 2)))' + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(pw / (x * y), log_warn=w) == '(declare-const x Real)\n(declare-const y Real)\n(* (pow x -1) (pow y -1) (ite (< x 1) x (pow x 2)))' + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + assert smtlib_code(pw / 3, log_warn=w) == '(declare-const x Real)\n(* (/ 1 3) (ite (< x 1) x (pow x 2)))' + + +# todo: make smtlib_code support arrays / matrices ? +# def test_smtlib_matrix_assign_to(): +# A = Matrix([[1, 2, 3]]) +# assert smtlib_code(A, assign_to='a') == "a = [1 2 3]" +# A = Matrix([[1, 2], [3, 4]]) +# assert smtlib_code(A, assign_to='A') == "A = [1 2;\n3 4]" + +# def test_julia_matrix_1x1(): +# A = Matrix([[3]]) +# B = MatrixSymbol('B', 1, 1) +# C = MatrixSymbol('C', 1, 2) +# assert julia_code(A, assign_to=B) == "B = [3]" +# raises(ValueError, lambda: julia_code(A, assign_to=C)) + +# def test_julia_matrix_elements(): +# A = Matrix([[x, 2, x * y]]) +# assert julia_code(A[0, 0] ** 2 + A[0, 1] + A[0, 2]) == "x .^ 2 + x .* y + 2" +# A = MatrixSymbol('AA', 1, 3) +# assert julia_code(A) == "AA" +# assert julia_code(A[0, 0] ** 2 + sin(A[0, 1]) + A[0, 2]) == \ +# "sin(AA[1,2]) + AA[1,1] .^ 2 + AA[1,3]" +# assert julia_code(sum(A)) == "AA[1,1] + AA[1,2] + AA[1,3]" + +def test_smtlib_boolean(): + with _check_warns([]) as w: + assert smtlib_code(True, auto_assert=False, log_warn=w) == 'true' + assert smtlib_code(True, log_warn=w) == '(assert true)' + assert smtlib_code(S.true, log_warn=w) == '(assert true)' + assert smtlib_code(S.false, log_warn=w) == '(assert false)' + assert smtlib_code(False, log_warn=w) == '(assert false)' + assert smtlib_code(False, auto_assert=False, log_warn=w) == 'false' + + +def test_not_supported(): + f = Function('f') + with _check_warns([_W.DEFAULTING_TO_FLOAT, _W.WILL_NOT_ASSERT]) as w: + raises(KeyError, lambda: smtlib_code(f(x).diff(x), symbol_table={f: Callable[[float], float]}, log_warn=w)) + with _check_warns([_W.WILL_NOT_ASSERT]) as w: + raises(KeyError, lambda: smtlib_code(S.ComplexInfinity, log_warn=w)) + + +def test_Float(): + assert smtlib_code(0.0) == "0.0" + assert smtlib_code(0.000000000000000003) == '(* 3.0 (pow 10 -18))' + assert smtlib_code(5.3) == "5.3" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_str.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_str.py new file mode 100644 index 0000000000000000000000000000000000000000..675212964b03bf9a9806088225c28d7f70971ca7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_str.py @@ -0,0 +1,1206 @@ +from sympy import MatAdd +from sympy.algebras.quaternion import Quaternion +from sympy.assumptions.ask import Q +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.combinatorics.partitions import Partition +from sympy.concrete.summations import (Sum, summation) +from sympy.core.add import Add +from sympy.core.containers import (Dict, Tuple) +from sympy.core.expr import UnevaluatedExpr, Expr +from sympy.core.function import (Derivative, Function, Lambda, Subs, WildFunction) +from sympy.core.mul import Mul +from sympy.core import (Catalan, EulerGamma, GoldenRatio, TribonacciConstant) +from sympy.core.numbers import (E, Float, I, Integer, Rational, nan, oo, pi, zoo) +from sympy.core.parameters import _exp_is_pow +from sympy.core.power import Pow +from sympy.core.relational import (Eq, Rel, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, Wild, symbols) +from sympy.functions.combinatorial.factorials import (factorial, factorial2, subfactorial) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.delta_functions import Heaviside +from sympy.functions.special.zeta_functions import zeta +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (Equivalent, false, true, Xor) +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions import Identity +from sympy.matrices.expressions.slice import MatrixSlice +from sympy.matrices import SparseMatrix +from sympy.polys.polytools import factor +from sympy.series.limits import Limit +from sympy.series.order import O +from sympy.sets.sets import (Complement, FiniteSet, Interval, SymmetricDifference) +from sympy.stats import (Covariance, Expectation, Probability, Variance) +from sympy.stats.rv import RandomSymbol +from sympy.external import import_module +from sympy.physics.control.lti import TransferFunction, Series, Parallel, \ + Feedback, TransferFunctionMatrix, MIMOSeries, MIMOParallel, MIMOFeedback +from sympy.physics.units import second, joule +from sympy.polys import (Poly, rootof, RootSum, groebner, ring, field, ZZ, QQ, + ZZ_I, QQ_I, lex, grlex) +from sympy.geometry import Point, Circle, Polygon, Ellipse, Triangle +from sympy.tensor import NDimArray +from sympy.tensor.array.expressions.array_expressions import ArraySymbol, ArrayElement + +from sympy.testing.pytest import raises, warns_deprecated_sympy + +from sympy.printing import sstr, sstrrepr, StrPrinter +from sympy.physics.quantum.trace import Tr + +x, y, z, w, t = symbols('x,y,z,w,t') +d = Dummy('d') + + +def test_printmethod(): + class R(Abs): + def _sympystr(self, printer): + return "foo(%s)" % printer._print(self.args[0]) + assert sstr(R(x)) == "foo(x)" + + class R(Abs): + def _sympystr(self, printer): + return "foo" + assert sstr(R(x)) == "foo" + + +def test_Abs(): + assert str(Abs(x)) == "Abs(x)" + assert str(Abs(Rational(1, 6))) == "1/6" + assert str(Abs(Rational(-1, 6))) == "1/6" + + +def test_Add(): + assert str(x + y) == "x + y" + assert str(x + 1) == "x + 1" + assert str(x + x**2) == "x**2 + x" + assert str(Add(0, 1, evaluate=False)) == "0 + 1" + assert str(Add(0, 0, 1, evaluate=False)) == "0 + 0 + 1" + assert str(1.0*x) == "1.0*x" + assert str(5 + x + y + x*y + x**2 + y**2) == "x**2 + x*y + x + y**2 + y + 5" + assert str(1 + x + x**2/2 + x**3/3) == "x**3/3 + x**2/2 + x + 1" + assert str(2*x - 7*x**2 + 2 + 3*y) == "-7*x**2 + 2*x + 3*y + 2" + assert str(x - y) == "x - y" + assert str(2 - x) == "2 - x" + assert str(x - 2) == "x - 2" + assert str(x - y - z - w) == "-w + x - y - z" + assert str(x - z*y**2*z*w) == "-w*y**2*z**2 + x" + assert str(x - 1*y*x*y) == "-x*y**2 + x" + assert str(sin(x).series(x, 0, 15)) == "x - x**3/6 + x**5/120 - x**7/5040 + x**9/362880 - x**11/39916800 + x**13/6227020800 + O(x**15)" + assert str(Add(Add(-w, x, evaluate=False), Add(-y, z, evaluate=False), evaluate=False)) == "(-w + x) + (-y + z)" + assert str(Add(Add(-x, -y, evaluate=False), -z, evaluate=False)) == "-z + (-x - y)" + assert str(Add(Add(Add(-x, -y, evaluate=False), -z, evaluate=False), -t, evaluate=False)) == "-t + (-z + (-x - y))" + + +def test_Catalan(): + assert str(Catalan) == "Catalan" + + +def test_ComplexInfinity(): + assert str(zoo) == "zoo" + + +def test_Derivative(): + assert str(Derivative(x, y)) == "Derivative(x, y)" + assert str(Derivative(x**2, x, evaluate=False)) == "Derivative(x**2, x)" + assert str(Derivative( + x**2/y, x, y, evaluate=False)) == "Derivative(x**2/y, x, y)" + + +def test_dict(): + assert str({1: 1 + x}) == sstr({1: 1 + x}) == "{1: x + 1}" + assert str({1: x**2, 2: y*x}) in ("{1: x**2, 2: x*y}", "{2: x*y, 1: x**2}") + assert sstr({1: x**2, 2: y*x}) == "{1: x**2, 2: x*y}" + + +def test_Dict(): + assert str(Dict({1: 1 + x})) == sstr({1: 1 + x}) == "{1: x + 1}" + assert str(Dict({1: x**2, 2: y*x})) in ( + "{1: x**2, 2: x*y}", "{2: x*y, 1: x**2}") + assert sstr(Dict({1: x**2, 2: y*x})) == "{1: x**2, 2: x*y}" + + +def test_Dummy(): + assert str(d) == "_d" + assert str(d + x) == "_d + x" + + +def test_EulerGamma(): + assert str(EulerGamma) == "EulerGamma" + + +def test_Exp(): + assert str(E) == "E" + with _exp_is_pow(True): + assert str(exp(x)) == "E**x" + + +def test_factorial(): + n = Symbol('n', integer=True) + assert str(factorial(-2)) == "zoo" + assert str(factorial(0)) == "1" + assert str(factorial(7)) == "5040" + assert str(factorial(n)) == "factorial(n)" + assert str(factorial(2*n)) == "factorial(2*n)" + assert str(factorial(factorial(n))) == 'factorial(factorial(n))' + assert str(factorial(factorial2(n))) == 'factorial(factorial2(n))' + assert str(factorial2(factorial(n))) == 'factorial2(factorial(n))' + assert str(factorial2(factorial2(n))) == 'factorial2(factorial2(n))' + assert str(subfactorial(3)) == "2" + assert str(subfactorial(n)) == "subfactorial(n)" + assert str(subfactorial(2*n)) == "subfactorial(2*n)" + + +def test_Function(): + f = Function('f') + fx = f(x) + w = WildFunction('w') + assert str(f) == "f" + assert str(fx) == "f(x)" + assert str(w) == "w_" + + +def test_Geometry(): + assert sstr(Point(0, 0)) == 'Point2D(0, 0)' + assert sstr(Circle(Point(0, 0), 3)) == 'Circle(Point2D(0, 0), 3)' + assert sstr(Ellipse(Point(1, 2), 3, 4)) == 'Ellipse(Point2D(1, 2), 3, 4)' + assert sstr(Triangle(Point(1, 1), Point(7, 8), Point(0, -1))) == \ + 'Triangle(Point2D(1, 1), Point2D(7, 8), Point2D(0, -1))' + assert sstr(Polygon(Point(5, 6), Point(-2, -3), Point(0, 0), Point(4, 7))) == \ + 'Polygon(Point2D(5, 6), Point2D(-2, -3), Point2D(0, 0), Point2D(4, 7))' + assert sstr(Triangle(Point(0, 0), Point(1, 0), Point(0, 1)), sympy_integers=True) == \ + 'Triangle(Point2D(S(0), S(0)), Point2D(S(1), S(0)), Point2D(S(0), S(1)))' + assert sstr(Ellipse(Point(1, 2), 3, 4), sympy_integers=True) == \ + 'Ellipse(Point2D(S(1), S(2)), S(3), S(4))' + + +def test_GoldenRatio(): + assert str(GoldenRatio) == "GoldenRatio" + + +def test_Heaviside(): + assert str(Heaviside(x)) == str(Heaviside(x, S.Half)) == "Heaviside(x)" + assert str(Heaviside(x, 1)) == "Heaviside(x, 1)" + + +def test_TribonacciConstant(): + assert str(TribonacciConstant) == "TribonacciConstant" + + +def test_ImaginaryUnit(): + assert str(I) == "I" + + +def test_Infinity(): + assert str(oo) == "oo" + assert str(oo*I) == "oo*I" + + +def test_Integer(): + assert str(Integer(-1)) == "-1" + assert str(Integer(1)) == "1" + assert str(Integer(-3)) == "-3" + assert str(Integer(0)) == "0" + assert str(Integer(25)) == "25" + + +def test_Integral(): + assert str(Integral(sin(x), y)) == "Integral(sin(x), y)" + assert str(Integral(sin(x), (y, 0, 1))) == "Integral(sin(x), (y, 0, 1))" + + +def test_Interval(): + n = (S.NegativeInfinity, 1, 2, S.Infinity) + for i in range(len(n)): + for j in range(i + 1, len(n)): + for l in (True, False): + for r in (True, False): + ival = Interval(n[i], n[j], l, r) + assert S(str(ival)) == ival + + +def test_AccumBounds(): + a = Symbol('a', real=True) + assert str(AccumBounds(0, a)) == "AccumBounds(0, a)" + assert str(AccumBounds(0, 1)) == "AccumBounds(0, 1)" + + +def test_Lambda(): + assert str(Lambda(d, d**2)) == "Lambda(_d, _d**2)" + # issue 2908 + assert str(Lambda((), 1)) == "Lambda((), 1)" + assert str(Lambda((), x)) == "Lambda((), x)" + assert str(Lambda((x, y), x+y)) == "Lambda((x, y), x + y)" + assert str(Lambda(((x, y),), x+y)) == "Lambda(((x, y),), x + y)" + + +def test_Limit(): + assert str(Limit(sin(x)/x, x, y)) == "Limit(sin(x)/x, x, y, dir='+')" + assert str(Limit(1/x, x, 0)) == "Limit(1/x, x, 0, dir='+')" + assert str( + Limit(sin(x)/x, x, y, dir="-")) == "Limit(sin(x)/x, x, y, dir='-')" + + +def test_list(): + assert str([x]) == sstr([x]) == "[x]" + assert str([x**2, x*y + 1]) == sstr([x**2, x*y + 1]) == "[x**2, x*y + 1]" + assert str([x**2, [y + x]]) == sstr([x**2, [y + x]]) == "[x**2, [x + y]]" + + +def test_Matrix_str(): + M = Matrix([[x**+1, 1], [y, x + y]]) + assert str(M) == "Matrix([[x, 1], [y, x + y]])" + assert sstr(M) == "Matrix([\n[x, 1],\n[y, x + y]])" + M = Matrix([[1]]) + assert str(M) == sstr(M) == "Matrix([[1]])" + M = Matrix([[1, 2]]) + assert str(M) == sstr(M) == "Matrix([[1, 2]])" + M = Matrix() + assert str(M) == sstr(M) == "Matrix(0, 0, [])" + M = Matrix(0, 1, lambda i, j: 0) + assert str(M) == sstr(M) == "Matrix(0, 1, [])" + + +def test_Mul(): + assert str(x/y) == "x/y" + assert str(y/x) == "y/x" + assert str(x/y/z) == "x/(y*z)" + assert str((x + 1)/(y + 2)) == "(x + 1)/(y + 2)" + assert str(2*x/3) == '2*x/3' + assert str(-2*x/3) == '-2*x/3' + assert str(-1.0*x) == '-1.0*x' + assert str(1.0*x) == '1.0*x' + assert str(Mul(0, 1, evaluate=False)) == '0*1' + assert str(Mul(1, 0, evaluate=False)) == '1*0' + assert str(Mul(1, 1, evaluate=False)) == '1*1' + assert str(Mul(1, 1, 1, evaluate=False)) == '1*1*1' + assert str(Mul(1, 2, evaluate=False)) == '1*2' + assert str(Mul(1, S.Half, evaluate=False)) == '1*(1/2)' + assert str(Mul(1, 1, S.Half, evaluate=False)) == '1*1*(1/2)' + assert str(Mul(1, 1, 2, 3, x, evaluate=False)) == '1*1*2*3*x' + assert str(Mul(1, -1, evaluate=False)) == '1*(-1)' + assert str(Mul(-1, 1, evaluate=False)) == '-1*1' + assert str(Mul(4, 3, 2, 1, 0, y, x, evaluate=False)) == '4*3*2*1*0*y*x' + assert str(Mul(4, 3, 2, 1+z, 0, y, x, evaluate=False)) == '4*3*2*(z + 1)*0*y*x' + assert str(Mul(Rational(2, 3), Rational(5, 7), evaluate=False)) == '(2/3)*(5/7)' + # For issue 14160 + assert str(Mul(-2, x, Pow(Mul(y,y,evaluate=False), -1, evaluate=False), + evaluate=False)) == '-2*x/(y*y)' + # issue 21537 + assert str(Mul(x, Pow(1/y, -1, evaluate=False), evaluate=False)) == 'x/(1/y)' + + # Issue 24108 + from sympy.core.parameters import evaluate + with evaluate(False): + assert str(Mul(Pow(Integer(2), Integer(-1)), Add(Integer(-1), Mul(Integer(-1), Integer(1))))) == "(-1 - 1*1)/2" + + class CustomClass1(Expr): + is_commutative = True + + class CustomClass2(Expr): + is_commutative = True + cc1 = CustomClass1() + cc2 = CustomClass2() + assert str(Rational(2)*cc1) == '2*CustomClass1()' + assert str(cc1*Rational(2)) == '2*CustomClass1()' + assert str(cc1*Float("1.5")) == '1.5*CustomClass1()' + assert str(cc2*Rational(2)) == '2*CustomClass2()' + assert str(cc2*Rational(2)*cc1) == '2*CustomClass1()*CustomClass2()' + assert str(cc1*Rational(2)*cc2) == '2*CustomClass1()*CustomClass2()' + + +def test_NaN(): + assert str(nan) == "nan" + + +def test_NegativeInfinity(): + assert str(-oo) == "-oo" + +def test_Order(): + assert str(O(x)) == "O(x)" + assert str(O(x**2)) == "O(x**2)" + assert str(O(x*y)) == "O(x*y, x, y)" + assert str(O(x, x)) == "O(x)" + assert str(O(x, (x, 0))) == "O(x)" + assert str(O(x, (x, oo))) == "O(x, (x, oo))" + assert str(O(x, x, y)) == "O(x, x, y)" + assert str(O(x, x, y)) == "O(x, x, y)" + assert str(O(x, (x, oo), (y, oo))) == "O(x, (x, oo), (y, oo))" + + +def test_Permutation_Cycle(): + from sympy.combinatorics import Permutation, Cycle + + # general principle: economically, canonically show all moved elements + # and the size of the permutation. + + for p, s in [ + (Cycle(), + '()'), + (Cycle(2), + '(2)'), + (Cycle(2, 1), + '(1 2)'), + (Cycle(1, 2)(5)(6, 7)(10), + '(1 2)(6 7)(10)'), + (Cycle(3, 4)(1, 2)(3, 4), + '(1 2)(4)'), + ]: + assert sstr(p) == s + + for p, s in [ + (Permutation([]), + 'Permutation([])'), + (Permutation([], size=1), + 'Permutation([0])'), + (Permutation([], size=2), + 'Permutation([0, 1])'), + (Permutation([], size=10), + 'Permutation([], size=10)'), + (Permutation([1, 0, 2]), + 'Permutation([1, 0, 2])'), + (Permutation([1, 0, 2, 3, 4, 5]), + 'Permutation([1, 0], size=6)'), + (Permutation([1, 0, 2, 3, 4, 5], size=10), + 'Permutation([1, 0], size=10)'), + ]: + assert sstr(p, perm_cyclic=False) == s + + for p, s in [ + (Permutation([]), + '()'), + (Permutation([], size=1), + '(0)'), + (Permutation([], size=2), + '(1)'), + (Permutation([], size=10), + '(9)'), + (Permutation([1, 0, 2]), + '(2)(0 1)'), + (Permutation([1, 0, 2, 3, 4, 5]), + '(5)(0 1)'), + (Permutation([1, 0, 2, 3, 4, 5], size=10), + '(9)(0 1)'), + (Permutation([0, 1, 3, 2, 4, 5], size=10), + '(9)(2 3)'), + ]: + assert sstr(p) == s + + + with warns_deprecated_sympy(): + old_print_cyclic = Permutation.print_cyclic + Permutation.print_cyclic = False + assert sstr(Permutation([1, 0, 2])) == 'Permutation([1, 0, 2])' + Permutation.print_cyclic = old_print_cyclic + +def test_Pi(): + assert str(pi) == "pi" + + +def test_Poly(): + assert str(Poly(0, x)) == "Poly(0, x, domain='ZZ')" + assert str(Poly(1, x)) == "Poly(1, x, domain='ZZ')" + assert str(Poly(x, x)) == "Poly(x, x, domain='ZZ')" + + assert str(Poly(2*x + 1, x)) == "Poly(2*x + 1, x, domain='ZZ')" + assert str(Poly(2*x - 1, x)) == "Poly(2*x - 1, x, domain='ZZ')" + + assert str(Poly(-1, x)) == "Poly(-1, x, domain='ZZ')" + assert str(Poly(-x, x)) == "Poly(-x, x, domain='ZZ')" + + assert str(Poly(-2*x + 1, x)) == "Poly(-2*x + 1, x, domain='ZZ')" + assert str(Poly(-2*x - 1, x)) == "Poly(-2*x - 1, x, domain='ZZ')" + + assert str(Poly(x - 1, x)) == "Poly(x - 1, x, domain='ZZ')" + assert str(Poly(2*x + x**5, x)) == "Poly(x**5 + 2*x, x, domain='ZZ')" + + assert str(Poly(3**(2*x), 3**x)) == "Poly((3**x)**2, 3**x, domain='ZZ')" + assert str(Poly((x**2)**x)) == "Poly(((x**2)**x), (x**2)**x, domain='ZZ')" + + assert str(Poly((x + y)**3, (x + y), expand=False) + ) == "Poly((x + y)**3, x + y, domain='ZZ')" + assert str(Poly((x - 1)**2, (x - 1), expand=False) + ) == "Poly((x - 1)**2, x - 1, domain='ZZ')" + + assert str( + Poly(x**2 + 1 + y, x)) == "Poly(x**2 + y + 1, x, domain='ZZ[y]')" + assert str( + Poly(x**2 - 1 + y, x)) == "Poly(x**2 + y - 1, x, domain='ZZ[y]')" + + assert str(Poly(x**2 + I*x, x)) == "Poly(x**2 + I*x, x, domain='ZZ_I')" + assert str(Poly(x**2 - I*x, x)) == "Poly(x**2 - I*x, x, domain='ZZ_I')" + + assert str(Poly(-x*y*z + x*y - 1, x, y, z) + ) == "Poly(-x*y*z + x*y - 1, x, y, z, domain='ZZ')" + assert str(Poly(-w*x**21*y**7*z + (1 + w)*z**3 - 2*x*z + 1, x, y, z)) == \ + "Poly(-w*x**21*y**7*z - 2*x*z + (w + 1)*z**3 + 1, x, y, z, domain='ZZ[w]')" + + assert str(Poly(x**2 + 1, x, modulus=2)) == "Poly(x**2 + 1, x, modulus=2)" + assert str(Poly(2*x**2 + 3*x + 4, x, modulus=17)) == "Poly(2*x**2 + 3*x + 4, x, modulus=17)" + + +def test_PolyRing(): + assert str(ring("x", ZZ, lex)[0]) == "Polynomial ring in x over ZZ with lex order" + assert str(ring("x,y", QQ, grlex)[0]) == "Polynomial ring in x, y over QQ with grlex order" + assert str(ring("x,y,z", ZZ["t"], lex)[0]) == "Polynomial ring in x, y, z over ZZ[t] with lex order" + + +def test_FracField(): + assert str(field("x", ZZ, lex)[0]) == "Rational function field in x over ZZ with lex order" + assert str(field("x,y", QQ, grlex)[0]) == "Rational function field in x, y over QQ with grlex order" + assert str(field("x,y,z", ZZ["t"], lex)[0]) == "Rational function field in x, y, z over ZZ[t] with lex order" + + +def test_PolyElement(): + Ruv, u,v = ring("u,v", ZZ) + Rxyz, x,y,z = ring("x,y,z", Ruv) + Rx_zzi, xz = ring("x", ZZ_I) + + assert str(x - x) == "0" + assert str(x - 1) == "x - 1" + assert str(x + 1) == "x + 1" + assert str(x**2) == "x**2" + + assert str((u**2 + 3*u*v + 1)*x**2*y + u + 1) == "(u**2 + 3*u*v + 1)*x**2*y + u + 1" + assert str((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x) == "(u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x" + assert str((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x + 1) == "(u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x + 1" + assert str((-u**2 + 3*u*v - 1)*x**2*y - (u + 1)*x - 1) == "-(u**2 - 3*u*v + 1)*x**2*y - (u + 1)*x - 1" + + assert str(-(v**2 + v + 1)*x + 3*u*v + 1) == "-(v**2 + v + 1)*x + 3*u*v + 1" + assert str(-(v**2 + v + 1)*x - 3*u*v + 1) == "-(v**2 + v + 1)*x - 3*u*v + 1" + + assert str((1+I)*xz + 2) == "(1 + 1*I)*x + (2 + 0*I)" + + +def test_FracElement(): + Fuv, u,v = field("u,v", ZZ) + Fxyzt, x,y,z,t = field("x,y,z,t", Fuv) + Rx_zzi, xz = field("x", QQ_I) + i = QQ_I(0, 1) + + assert str(x - x) == "0" + assert str(x - 1) == "x - 1" + assert str(x + 1) == "x + 1" + + assert str(x/3) == "x/3" + assert str(x/z) == "x/z" + assert str(x*y/z) == "x*y/z" + assert str(x/(z*t)) == "x/(z*t)" + assert str(x*y/(z*t)) == "x*y/(z*t)" + + assert str((x - 1)/y) == "(x - 1)/y" + assert str((x + 1)/y) == "(x + 1)/y" + assert str((-x - 1)/y) == "(-x - 1)/y" + assert str((x + 1)/(y*z)) == "(x + 1)/(y*z)" + assert str(-y/(x + 1)) == "-y/(x + 1)" + assert str(y*z/(x + 1)) == "y*z/(x + 1)" + + assert str(((u + 1)*x*y + 1)/((v - 1)*z - 1)) == "((u + 1)*x*y + 1)/((v - 1)*z - 1)" + assert str(((u + 1)*x*y + 1)/((v - 1)*z - t*u*v - 1)) == "((u + 1)*x*y + 1)/((v - 1)*z - u*v*t - 1)" + + assert str((1+i)/xz) == "(1 + 1*I)/x" + assert str(((1+i)*xz - i)/xz) == "((1 + 1*I)*x + (0 + -1*I))/x" + + +def test_GaussianInteger(): + assert str(ZZ_I(1, 0)) == "1" + assert str(ZZ_I(-1, 0)) == "-1" + assert str(ZZ_I(0, 1)) == "I" + assert str(ZZ_I(0, -1)) == "-I" + assert str(ZZ_I(0, 2)) == "2*I" + assert str(ZZ_I(0, -2)) == "-2*I" + assert str(ZZ_I(1, 1)) == "1 + I" + assert str(ZZ_I(-1, -1)) == "-1 - I" + assert str(ZZ_I(-1, -2)) == "-1 - 2*I" + + +def test_GaussianRational(): + assert str(QQ_I(1, 0)) == "1" + assert str(QQ_I(QQ(2, 3), 0)) == "2/3" + assert str(QQ_I(0, QQ(2, 3))) == "2*I/3" + assert str(QQ_I(QQ(1, 2), QQ(-2, 3))) == "1/2 - 2*I/3" + + +def test_Pow(): + assert str(x**-1) == "1/x" + assert str(x**-2) == "x**(-2)" + assert str(x**2) == "x**2" + assert str((x + y)**-1) == "1/(x + y)" + assert str((x + y)**-2) == "(x + y)**(-2)" + assert str((x + y)**2) == "(x + y)**2" + assert str((x + y)**(1 + x)) == "(x + y)**(x + 1)" + assert str(x**Rational(1, 3)) == "x**(1/3)" + assert str(1/x**Rational(1, 3)) == "x**(-1/3)" + assert str(sqrt(sqrt(x))) == "x**(1/4)" + # not the same as x**-1 + assert str(x**-1.0) == 'x**(-1.0)' + # see issue #2860 + assert str(Pow(S(2), -1.0, evaluate=False)) == '2**(-1.0)' + + +def test_sqrt(): + assert str(sqrt(x)) == "sqrt(x)" + assert str(sqrt(x**2)) == "sqrt(x**2)" + assert str(1/sqrt(x)) == "1/sqrt(x)" + assert str(1/sqrt(x**2)) == "1/sqrt(x**2)" + assert str(y/sqrt(x)) == "y/sqrt(x)" + assert str(x**0.5) == "x**0.5" + assert str(1/x**0.5) == "x**(-0.5)" + + +def test_Rational(): + n1 = Rational(1, 4) + n2 = Rational(1, 3) + n3 = Rational(2, 4) + n4 = Rational(2, -4) + n5 = Rational(0) + n7 = Rational(3) + n8 = Rational(-3) + assert str(n1*n2) == "1/12" + assert str(n1*n2) == "1/12" + assert str(n3) == "1/2" + assert str(n1*n3) == "1/8" + assert str(n1 + n3) == "3/4" + assert str(n1 + n2) == "7/12" + assert str(n1 + n4) == "-1/4" + assert str(n4*n4) == "1/4" + assert str(n4 + n2) == "-1/6" + assert str(n4 + n5) == "-1/2" + assert str(n4*n5) == "0" + assert str(n3 + n4) == "0" + assert str(n1**n7) == "1/64" + assert str(n2**n7) == "1/27" + assert str(n2**n8) == "27" + assert str(n7**n8) == "1/27" + assert str(Rational("-25")) == "-25" + assert str(Rational("1.25")) == "5/4" + assert str(Rational("-2.6e-2")) == "-13/500" + assert str(S("25/7")) == "25/7" + assert str(S("-123/569")) == "-123/569" + assert str(S("0.1[23]", rational=1)) == "61/495" + assert str(S("5.1[666]", rational=1)) == "31/6" + assert str(S("-5.1[666]", rational=1)) == "-31/6" + assert str(S("0.[9]", rational=1)) == "1" + assert str(S("-0.[9]", rational=1)) == "-1" + + assert str(sqrt(Rational(1, 4))) == "1/2" + assert str(sqrt(Rational(1, 36))) == "1/6" + + assert str((123**25) ** Rational(1, 25)) == "123" + assert str((123**25 + 1)**Rational(1, 25)) != "123" + assert str((123**25 - 1)**Rational(1, 25)) != "123" + assert str((123**25 - 1)**Rational(1, 25)) != "122" + + assert str(sqrt(Rational(81, 36))**3) == "27/8" + assert str(1/sqrt(Rational(81, 36))**3) == "8/27" + + assert str(sqrt(-4)) == str(2*I) + assert str(2**Rational(1, 10**10)) == "2**(1/10000000000)" + + assert sstr(Rational(2, 3), sympy_integers=True) == "S(2)/3" + x = Symbol("x") + assert sstr(x**Rational(2, 3), sympy_integers=True) == "x**(S(2)/3)" + assert sstr(Eq(x, Rational(2, 3)), sympy_integers=True) == "Eq(x, S(2)/3)" + assert sstr(Limit(x, x, Rational(7, 2)), sympy_integers=True) == \ + "Limit(x, x, S(7)/2, dir='+')" + + +def test_Float(): + # NOTE dps is the whole number of decimal digits + assert str(Float('1.23', dps=1 + 2)) == '1.23' + assert str(Float('1.23456789', dps=1 + 8)) == '1.23456789' + assert str( + Float('1.234567890123456789', dps=1 + 18)) == '1.234567890123456789' + assert str(pi.evalf(1 + 2)) == '3.14' + assert str(pi.evalf(1 + 14)) == '3.14159265358979' + assert str(pi.evalf(1 + 64)) == ('3.141592653589793238462643383279' + '5028841971693993751058209749445923') + assert str(pi.round(-1)) == '0.0' + assert str((pi**400 - (pi**400).round(1)).n(2)) == '-0.e+88' + assert sstr(Float("100"), full_prec=False, min=-2, max=2) == '1.0e+2' + assert sstr(Float("100"), full_prec=False, min=-2, max=3) == '100.0' + assert sstr(Float("0.1"), full_prec=False, min=-2, max=3) == '0.1' + assert sstr(Float("0.099"), min=-2, max=3) == '9.90000000000000e-2' + + +def test_Relational(): + assert str(Rel(x, y, "<")) == "x < y" + assert str(Rel(x + y, y, "==")) == "Eq(x + y, y)" + assert str(Rel(x, y, "!=")) == "Ne(x, y)" + assert str(Eq(x, 1) | Eq(x, 2)) == "Eq(x, 1) | Eq(x, 2)" + assert str(Ne(x, 1) & Ne(x, 2)) == "Ne(x, 1) & Ne(x, 2)" + + +def test_AppliedBinaryRelation(): + assert str(Q.eq(x, y)) == "Q.eq(x, y)" + assert str(Q.ne(x, y)) == "Q.ne(x, y)" + + +def test_CRootOf(): + assert str(rootof(x**5 + 2*x - 1, 0)) == "CRootOf(x**5 + 2*x - 1, 0)" + + +def test_RootSum(): + f = x**5 + 2*x - 1 + + assert str( + RootSum(f, Lambda(z, z), auto=False)) == "RootSum(x**5 + 2*x - 1)" + assert str(RootSum(f, Lambda( + z, z**2), auto=False)) == "RootSum(x**5 + 2*x - 1, Lambda(z, z**2))" + + +def test_GroebnerBasis(): + assert str(groebner( + [], x, y)) == "GroebnerBasis([], x, y, domain='ZZ', order='lex')" + + F = [x**2 - 3*y - x + 1, y**2 - 2*x + y - 1] + + assert str(groebner(F, order='grlex')) == \ + "GroebnerBasis([x**2 - x - 3*y + 1, y**2 - 2*x + y - 1], x, y, domain='ZZ', order='grlex')" + assert str(groebner(F, order='lex')) == \ + "GroebnerBasis([2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7], x, y, domain='ZZ', order='lex')" + +def test_set(): + assert sstr(set()) == 'set()' + assert sstr(frozenset()) == 'frozenset()' + + assert sstr({1}) == '{1}' + assert sstr(frozenset([1])) == 'frozenset({1})' + assert sstr({1, 2, 3}) == '{1, 2, 3}' + assert sstr(frozenset([1, 2, 3])) == 'frozenset({1, 2, 3})' + + assert sstr( + {1, x, x**2, x**3, x**4}) == '{1, x, x**2, x**3, x**4}' + assert sstr( + frozenset([1, x, x**2, x**3, x**4])) == 'frozenset({1, x, x**2, x**3, x**4})' + + +def test_SparseMatrix(): + M = SparseMatrix([[x**+1, 1], [y, x + y]]) + assert str(M) == "Matrix([[x, 1], [y, x + y]])" + assert sstr(M) == "Matrix([\n[x, 1],\n[y, x + y]])" + + +def test_Sum(): + assert str(summation(cos(3*z), (z, x, y))) == "Sum(cos(3*z), (z, x, y))" + assert str(Sum(x*y**2, (x, -2, 2), (y, -5, 5))) == \ + "Sum(x*y**2, (x, -2, 2), (y, -5, 5))" + + +def test_Symbol(): + assert str(y) == "y" + assert str(x) == "x" + e = x + assert str(e) == "x" + + +def test_tuple(): + assert str((x,)) == sstr((x,)) == "(x,)" + assert str((x + y, 1 + x)) == sstr((x + y, 1 + x)) == "(x + y, x + 1)" + assert str((x + y, ( + 1 + x, x**2))) == sstr((x + y, (1 + x, x**2))) == "(x + y, (x + 1, x**2))" + + +def test_Series_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(t*x**2 - t**w*x + w, t - y, y) + assert str(Series(tf1, tf2)) == \ + "Series(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y))" + assert str(Series(tf1, tf2, tf3)) == \ + "Series(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y), TransferFunction(t*x**2 - t**w*x + w, t - y, y))" + assert str(Series(-tf2, tf1)) == \ + "Series(TransferFunction(-x + y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y))" + + +def test_MIMOSeries_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + assert str(MIMOSeries(tfm_1, tfm_2)) == \ + "MIMOSeries(TransferFunctionMatrix(((TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)), "\ + "(TransferFunction(x - y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y)))), "\ + "TransferFunctionMatrix(((TransferFunction(x - y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y)), "\ + "(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)))))" + + +def test_TransferFunction_str(): + tf1 = TransferFunction(x - 1, x + 1, x) + assert str(tf1) == "TransferFunction(x - 1, x + 1, x)" + tf2 = TransferFunction(x + 1, 2 - y, x) + assert str(tf2) == "TransferFunction(x + 1, 2 - y, x)" + tf3 = TransferFunction(y, y**2 + 2*y + 3, y) + assert str(tf3) == "TransferFunction(y, y**2 + 2*y + 3, y)" + + +def test_Parallel_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(t*x**2 - t**w*x + w, t - y, y) + assert str(Parallel(tf1, tf2)) == \ + "Parallel(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y))" + assert str(Parallel(tf1, tf2, tf3)) == \ + "Parallel(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y), TransferFunction(t*x**2 - t**w*x + w, t - y, y))" + assert str(Parallel(-tf2, tf1)) == \ + "Parallel(TransferFunction(-x + y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y))" + + +def test_MIMOParallel_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + assert str(MIMOParallel(tfm_1, tfm_2)) == \ + "MIMOParallel(TransferFunctionMatrix(((TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)), "\ + "(TransferFunction(x - y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y)))), "\ + "TransferFunctionMatrix(((TransferFunction(x - y, x + y, y), TransferFunction(x*y**2 - z, -t**3 + y**3, y)), "\ + "(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)))))" + + +def test_Feedback_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(t*x**2 - t**w*x + w, t - y, y) + assert str(Feedback(tf1*tf2, tf3)) == \ + "Feedback(Series(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)), " \ + "TransferFunction(t*x**2 - t**w*x + w, t - y, y), -1)" + assert str(Feedback(tf1, TransferFunction(1, 1, y), 1)) == \ + "Feedback(TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(1, 1, y), 1)" + + +def test_MIMOFeedback_str(): + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + tfm_2 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + assert (str(MIMOFeedback(tfm_1, tfm_2)) \ + == "MIMOFeedback(TransferFunctionMatrix(((TransferFunction(-x + y, y + z, x), TransferFunction(x**2 - y**3, y - z, x))," \ + " (TransferFunction(x**2 - y**3, y - z, x), TransferFunction(-x + y, y + z, x)))), " \ + "TransferFunctionMatrix(((TransferFunction(x**2 - y**3, y - z, x), " \ + "TransferFunction(-x + y, y + z, x)), (TransferFunction(-x + y, y + z, x), TransferFunction(x**2 - y**3, y - z, x)))), -1)") + assert (str(MIMOFeedback(tfm_1, tfm_2, 1)) \ + == "MIMOFeedback(TransferFunctionMatrix(((TransferFunction(-x + y, y + z, x), TransferFunction(x**2 - y**3, y - z, x)), " \ + "(TransferFunction(x**2 - y**3, y - z, x), TransferFunction(-x + y, y + z, x)))), " \ + "TransferFunctionMatrix(((TransferFunction(x**2 - y**3, y - z, x), TransferFunction(-x + y, y + z, x)), "\ + "(TransferFunction(-x + y, y + z, x), TransferFunction(x**2 - y**3, y - z, x)))), 1)") + + +def test_TransferFunctionMatrix_str(): + tf1 = TransferFunction(x*y**2 - z, y**3 - t**3, y) + tf2 = TransferFunction(x - y, x + y, y) + tf3 = TransferFunction(t*x**2 - t**w*x + w, t - y, y) + assert str(TransferFunctionMatrix([[tf1], [tf2]])) == \ + "TransferFunctionMatrix(((TransferFunction(x*y**2 - z, -t**3 + y**3, y),), (TransferFunction(x - y, x + y, y),)))" + assert str(TransferFunctionMatrix([[tf1, tf2], [tf3, tf2]])) == \ + "TransferFunctionMatrix(((TransferFunction(x*y**2 - z, -t**3 + y**3, y), TransferFunction(x - y, x + y, y)), (TransferFunction(t*x**2 - t**w*x + w, t - y, y), TransferFunction(x - y, x + y, y))))" + + +def test_Quaternion_str_printer(): + q = Quaternion(x, y, z, t) + assert str(q) == "x + y*i + z*j + t*k" + q = Quaternion(x,y,z,x*t) + assert str(q) == "x + y*i + z*j + t*x*k" + q = Quaternion(x,y,z,x+t) + assert str(q) == "x + y*i + z*j + (t + x)*k" + + +def test_Quantity_str(): + assert sstr(second, abbrev=True) == "s" + assert sstr(joule, abbrev=True) == "J" + assert str(second) == "second" + assert str(joule) == "joule" + + +def test_wild_str(): + # Check expressions containing Wild not causing infinite recursion + w = Wild('x') + assert str(w + 1) == 'x_ + 1' + assert str(exp(2**w) + 5) == 'exp(2**x_) + 5' + assert str(3*w + 1) == '3*x_ + 1' + assert str(1/w + 1) == '1 + 1/x_' + assert str(w**2 + 1) == 'x_**2 + 1' + assert str(1/(1 - w)) == '1/(1 - x_)' + + +def test_wild_matchpy(): + from sympy.utilities.matchpy_connector import WildDot, WildPlus, WildStar + + matchpy = import_module("matchpy") + + if matchpy is None: + return + + wd = WildDot('w_') + wp = WildPlus('w__') + ws = WildStar('w___') + + assert str(wd) == 'w_' + assert str(wp) == 'w__' + assert str(ws) == 'w___' + + assert str(wp/ws + 2**wd) == '2**w_ + w__/w___' + assert str(sin(wd)*cos(wp)*sqrt(ws)) == 'sqrt(w___)*sin(w_)*cos(w__)' + + +def test_zeta(): + assert str(zeta(3)) == "zeta(3)" + + +def test_issue_3101(): + e = x - y + a = str(e) + b = str(e) + assert a == b + + +def test_issue_3103(): + e = -2*sqrt(x) - y/sqrt(x)/2 + assert str(e) not in ["(-2)*x**1/2(-1/2)*x**(-1/2)*y", + "-2*x**1/2(-1/2)*x**(-1/2)*y", "-2*x**1/2-1/2*x**-1/2*w"] + assert str(e) == "-2*sqrt(x) - y/(2*sqrt(x))" + + +def test_issue_4021(): + e = Integral(x, x) + 1 + assert str(e) == 'Integral(x, x) + 1' + + +def test_sstrrepr(): + assert sstr('abc') == 'abc' + assert sstrrepr('abc') == "'abc'" + + e = ['a', 'b', 'c', x] + assert sstr(e) == "[a, b, c, x]" + assert sstrrepr(e) == "['a', 'b', 'c', x]" + + +def test_infinity(): + assert sstr(oo*I) == "oo*I" + + +def test_full_prec(): + assert sstr(S("0.3"), full_prec=True) == "0.300000000000000" + assert sstr(S("0.3"), full_prec="auto") == "0.300000000000000" + assert sstr(S("0.3"), full_prec=False) == "0.3" + assert sstr(S("0.3")*x, full_prec=True) in [ + "0.300000000000000*x", + "x*0.300000000000000" + ] + assert sstr(S("0.3")*x, full_prec="auto") in [ + "0.3*x", + "x*0.3" + ] + assert sstr(S("0.3")*x, full_prec=False) in [ + "0.3*x", + "x*0.3" + ] + + +def test_noncommutative(): + A, B, C = symbols('A,B,C', commutative=False) + + assert sstr(A*B*C**-1) == "A*B*C**(-1)" + assert sstr(C**-1*A*B) == "C**(-1)*A*B" + assert sstr(A*C**-1*B) == "A*C**(-1)*B" + assert sstr(sqrt(A)) == "sqrt(A)" + assert sstr(1/sqrt(A)) == "A**(-1/2)" + + +def test_empty_printer(): + str_printer = StrPrinter() + assert str_printer.emptyPrinter("foo") == "foo" + assert str_printer.emptyPrinter(x*y) == "x*y" + assert str_printer.emptyPrinter(32) == "32" + +def test_decimal_printer(): + dec_printer = StrPrinter(settings={"dps":3}) + f = Function('f') + assert dec_printer.doprint(f(1.329294)) == "f(1.33)" + + +def test_settings(): + raises(TypeError, lambda: sstr(S(4), method="garbage")) + + +def test_RandomDomain(): + from sympy.stats import Normal, Die, Exponential, pspace, where + X = Normal('x1', 0, 1) + assert str(where(X > 0)) == "Domain: (0 < x1) & (x1 < oo)" + + D = Die('d1', 6) + assert str(where(D > 4)) == "Domain: Eq(d1, 5) | Eq(d1, 6)" + + A = Exponential('a', 1) + B = Exponential('b', 1) + assert str(pspace(Tuple(A, B)).domain) == "Domain: (0 <= a) & (0 <= b) & (a < oo) & (b < oo)" + + +def test_FiniteSet(): + assert str(FiniteSet(*range(1, 51))) == ( + '{1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17,' + ' 18, 19, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33, 34,' + ' 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50}' + ) + assert str(FiniteSet(*range(1, 6))) == '{1, 2, 3, 4, 5}' + assert str(FiniteSet(*[x*y, x**2])) == '{x**2, x*y}' + assert str(FiniteSet(FiniteSet(FiniteSet(x, y), 5), FiniteSet(x,y), 5) + ) == 'FiniteSet(5, FiniteSet(5, {x, y}), {x, y})' + + +def test_Partition(): + assert str(Partition(FiniteSet(x, y), {z})) == 'Partition({z}, {x, y})' + +def test_UniversalSet(): + assert str(S.UniversalSet) == 'UniversalSet' + + +def test_PrettyPoly(): + F = QQ.frac_field(x, y) + R = QQ[x, y] + assert sstr(F.convert(x/(x + y))) == sstr(x/(x + y)) + assert sstr(R.convert(x + y)) == sstr(x + y) + + +def test_categories(): + from sympy.categories import (Object, NamedMorphism, + IdentityMorphism, Category) + + A = Object("A") + B = Object("B") + + f = NamedMorphism(A, B, "f") + id_A = IdentityMorphism(A) + + K = Category("K") + + assert str(A) == 'Object("A")' + assert str(f) == 'NamedMorphism(Object("A"), Object("B"), "f")' + assert str(id_A) == 'IdentityMorphism(Object("A"))' + + assert str(K) == 'Category("K")' + + +def test_Tr(): + A, B = symbols('A B', commutative=False) + t = Tr(A*B) + assert str(t) == 'Tr(A*B)' + + +def test_issue_6387(): + assert str(factor(-3.0*z + 3)) == '-3.0*(1.0*z - 1.0)' + + +def test_MatMul_MatAdd(): + X, Y = MatrixSymbol("X", 2, 2), MatrixSymbol("Y", 2, 2) + assert str(2*(X + Y)) == "2*X + 2*Y" + + assert str(I*X) == "I*X" + assert str(-I*X) == "-I*X" + assert str((1 + I)*X) == '(1 + I)*X' + assert str(-(1 + I)*X) == '(-1 - I)*X' + assert str(MatAdd(MatAdd(X, Y), MatAdd(X, Y))) == '(X + Y) + (X + Y)' + + +def test_MatrixSlice(): + n = Symbol('n', integer=True) + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', 10, 10) + Z = MatrixSymbol('Z', 10, 10) + + assert str(MatrixSlice(X, (None, None, None), (None, None, None))) == 'X[:, :]' + assert str(X[x:x + 1, y:y + 1]) == 'X[x:x + 1, y:y + 1]' + assert str(X[x:x + 1:2, y:y + 1:2]) == 'X[x:x + 1:2, y:y + 1:2]' + assert str(X[:x, y:]) == 'X[:x, y:]' + assert str(X[:x, y:]) == 'X[:x, y:]' + assert str(X[x:, :y]) == 'X[x:, :y]' + assert str(X[x:y, z:w]) == 'X[x:y, z:w]' + assert str(X[x:y:t, w:t:x]) == 'X[x:y:t, w:t:x]' + assert str(X[x::y, t::w]) == 'X[x::y, t::w]' + assert str(X[:x:y, :t:w]) == 'X[:x:y, :t:w]' + assert str(X[::x, ::y]) == 'X[::x, ::y]' + assert str(MatrixSlice(X, (0, None, None), (0, None, None))) == 'X[:, :]' + assert str(MatrixSlice(X, (None, n, None), (None, n, None))) == 'X[:, :]' + assert str(MatrixSlice(X, (0, n, None), (0, n, None))) == 'X[:, :]' + assert str(MatrixSlice(X, (0, n, 2), (0, n, 2))) == 'X[::2, ::2]' + assert str(X[1:2:3, 4:5:6]) == 'X[1:2:3, 4:5:6]' + assert str(X[1:3:5, 4:6:8]) == 'X[1:3:5, 4:6:8]' + assert str(X[1:10:2]) == 'X[1:10:2, :]' + assert str(Y[:5, 1:9:2]) == 'Y[:5, 1:9:2]' + assert str(Y[:5, 1:10:2]) == 'Y[:5, 1::2]' + assert str(Y[5, :5:2]) == 'Y[5:6, :5:2]' + assert str(X[0:1, 0:1]) == 'X[:1, :1]' + assert str(X[0:1:2, 0:1:2]) == 'X[:1:2, :1:2]' + assert str((Y + Z)[2:, 2:]) == '(Y + Z)[2:, 2:]' + +def test_true_false(): + assert str(true) == repr(true) == sstr(true) == "True" + assert str(false) == repr(false) == sstr(false) == "False" + +def test_Equivalent(): + assert str(Equivalent(y, x)) == "Equivalent(x, y)" + +def test_Xor(): + assert str(Xor(y, x, evaluate=False)) == "x ^ y" + +def test_Complement(): + assert str(Complement(S.Reals, S.Naturals)) == 'Complement(Reals, Naturals)' + +def test_SymmetricDifference(): + assert str(SymmetricDifference(Interval(2, 3), Interval(3, 4),evaluate=False)) == \ + 'SymmetricDifference(Interval(2, 3), Interval(3, 4))' + + +def test_UnevaluatedExpr(): + a, b = symbols("a b") + expr1 = 2*UnevaluatedExpr(a+b) + assert str(expr1) == "2*(a + b)" + + +def test_MatrixElement_printing(): + # test cases for issue #11821 + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert(str(A[0, 0]) == "A[0, 0]") + assert(str(3 * A[0, 0]) == "3*A[0, 0]") + + F = C[0, 0].subs(C, A - B) + assert str(F) == "(A - B)[0, 0]" + + +def test_MatrixSymbol_printing(): + A = MatrixSymbol("A", 3, 3) + B = MatrixSymbol("B", 3, 3) + + assert str(A - A*B - B) == "A - A*B - B" + assert str(A*B - (A+B)) == "-A + A*B - B" + assert str(A**(-1)) == "A**(-1)" + assert str(A**3) == "A**3" + + +def test_MatrixExpressions(): + n = Symbol('n', integer=True) + X = MatrixSymbol('X', n, n) + + assert str(X) == "X" + + # Apply function elementwise (`ElementwiseApplyFunc`): + + expr = (X.T*X).applyfunc(sin) + assert str(expr) == 'Lambda(_d, sin(_d)).(X.T*X)' + + lamda = Lambda(x, 1/x) + expr = (n*X).applyfunc(lamda) + assert str(expr) == 'Lambda(x, 1/x).(n*X)' + + +def test_Subs_printing(): + assert str(Subs(x, (x,), (1,))) == 'Subs(x, x, 1)' + assert str(Subs(x + y, (x, y), (1, 2))) == 'Subs(x + y, (x, y), (1, 2))' + + +def test_issue_15716(): + e = Integral(factorial(x), (x, -oo, oo)) + assert e.as_terms() == ([(e, ((1.0, 0.0), (1,), ()))], [e]) + + +def test_str_special_matrices(): + from sympy.matrices import Identity, ZeroMatrix, OneMatrix + assert str(Identity(4)) == 'I' + assert str(ZeroMatrix(2, 2)) == '0' + assert str(OneMatrix(2, 2)) == '1' + + +def test_issue_14567(): + assert factorial(Sum(-1, (x, 0, 0))) + y # doesn't raise an error + + +def test_issue_21823(): + assert str(Partition([1, 2])) == 'Partition({1, 2})' + assert str(Partition({1, 2})) == 'Partition({1, 2})' + + +def test_issue_22689(): + assert str(Mul(Pow(x,-2, evaluate=False), Pow(3,-1,evaluate=False), evaluate=False)) == "1/(x**2*3)" + + +def test_issue_21119_21460(): + ss = lambda x: str(S(x, evaluate=False)) + assert ss('4/2') == '4/2' + assert ss('4/-2') == '4/(-2)' + assert ss('-4/2') == '-4/2' + assert ss('-4/-2') == '-4/(-2)' + assert ss('-2*3/-1') == '-2*3/(-1)' + assert ss('-2*3/-1/2') == '-2*3/(-1*2)' + assert ss('4/2/1') == '4/(2*1)' + assert ss('-2/-1/2') == '-2/(-1*2)' + assert ss('2*3*4**(-2*3)') == '2*3/4**(2*3)' + assert ss('2*3*1*4**(-2*3)') == '2*3*1/4**(2*3)' + + +def test_Str(): + from sympy.core.symbol import Str + assert str(Str('x')) == 'x' + assert sstrrepr(Str('x')) == "Str('x')" + + +def test_diffgeom(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField + x,y = symbols('x y', real=True) + m = Manifold('M', 2) + assert str(m) == "M" + p = Patch('P', m) + assert str(p) == "P" + rect = CoordSystem('rect', p, [x, y]) + assert str(rect) == "rect" + b = BaseScalarField(rect, 0) + assert str(b) == "x" + +def test_NDimArray(): + assert sstr(NDimArray(1.0), full_prec=True) == '1.00000000000000' + assert sstr(NDimArray(1.0), full_prec=False) == '1.0' + assert sstr(NDimArray([1.0, 2.0]), full_prec=True) == '[1.00000000000000, 2.00000000000000]' + assert sstr(NDimArray([1.0, 2.0]), full_prec=False) == '[1.0, 2.0]' + assert sstr(NDimArray([], (0,))) == 'ImmutableDenseNDimArray([], (0,))' + assert sstr(NDimArray([], (0, 0))) == 'ImmutableDenseNDimArray([], (0, 0))' + assert sstr(NDimArray([], (0, 1))) == 'ImmutableDenseNDimArray([], (0, 1))' + assert sstr(NDimArray([], (1, 0))) == 'ImmutableDenseNDimArray([], (1, 0))' + +def test_Predicate(): + assert sstr(Q.even) == 'Q.even' + +def test_AppliedPredicate(): + assert sstr(Q.even(x)) == 'Q.even(x)' + +def test_printing_str_array_expressions(): + assert sstr(ArraySymbol("A", (2, 3, 4))) == "A" + assert sstr(ArrayElement("A", (2, 1/(1-x), 0))) == "A[2, 1/(1 - x), 0]" + M = MatrixSymbol("M", 3, 3) + N = MatrixSymbol("N", 3, 3) + assert sstr(ArrayElement(M*N, [x, 0])) == "(M*N)[x, 0]" + +def test_printing_stats(): + # issue 24132 + x = RandomSymbol("x") + y = RandomSymbol("y") + z1 = Probability(x > 0)*Identity(2) + z2 = Expectation(x)*Identity(2) + z3 = Variance(x)*Identity(2) + z4 = Covariance(x, y) * Identity(2) + + assert str(z1) == "Probability(x > 0)*I" + assert str(z2) == "Expectation(x)*I" + assert str(z3) == "Variance(x)*I" + assert str(z4) == "Covariance(x, y)*I" + assert z1.is_commutative == False + assert z2.is_commutative == False + assert z3.is_commutative == False + assert z4.is_commutative == False + assert z2._eval_is_commutative() == False + assert z3._eval_is_commutative() == False + assert z4._eval_is_commutative() == False diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tableform.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tableform.py new file mode 100644 index 0000000000000000000000000000000000000000..05802dd104a12f2f53d137167ecf31d201ff8dfc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tableform.py @@ -0,0 +1,182 @@ +from sympy.core.singleton import S +from sympy.printing.tableform import TableForm +from sympy.printing.latex import latex +from sympy.abc import x +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.testing.pytest import raises + +from textwrap import dedent + + +def test_TableForm(): + s = str(TableForm([["a", "b"], ["c", "d"], ["e", 0]], + headings="automatic")) + assert s == ( + ' | 1 2\n' + '-------\n' + '1 | a b\n' + '2 | c d\n' + '3 | e ' + ) + s = str(TableForm([["a", "b"], ["c", "d"], ["e", 0]], + headings="automatic", wipe_zeros=False)) + assert s == dedent('''\ + | 1 2 + ------- + 1 | a b + 2 | c d + 3 | e 0''') + s = str(TableForm([[x**2, "b"], ["c", x**2], ["e", "f"]], + headings=("automatic", None))) + assert s == ( + '1 | x**2 b \n' + '2 | c x**2\n' + '3 | e f ' + ) + s = str(TableForm([["a", "b"], ["c", "d"], ["e", "f"]], + headings=(None, "automatic"))) + assert s == dedent('''\ + 1 2 + --- + a b + c d + e f''') + s = str(TableForm([[5, 7], [4, 2], [10, 3]], + headings=[["Group A", "Group B", "Group C"], ["y1", "y2"]])) + assert s == ( + ' | y1 y2\n' + '---------------\n' + 'Group A | 5 7 \n' + 'Group B | 4 2 \n' + 'Group C | 10 3 ' + ) + raises( + ValueError, + lambda: + TableForm( + [[5, 7], [4, 2], [10, 3]], + headings=[["Group A", "Group B", "Group C"], ["y1", "y2"]], + alignments="middle") + ) + s = str(TableForm([[5, 7], [4, 2], [10, 3]], + headings=[["Group A", "Group B", "Group C"], ["y1", "y2"]], + alignments="right")) + assert s == dedent('''\ + | y1 y2 + --------------- + Group A | 5 7 + Group B | 4 2 + Group C | 10 3''') + + # other alignment permutations + d = [[1, 100], [100, 1]] + s = TableForm(d, headings=(('xxx', 'x'), None), alignments='l') + assert str(s) == ( + 'xxx | 1 100\n' + ' x | 100 1 ' + ) + s = TableForm(d, headings=(('xxx', 'x'), None), alignments='lr') + assert str(s) == dedent('''\ + xxx | 1 100 + x | 100 1''') + s = TableForm(d, headings=(('xxx', 'x'), None), alignments='clr') + assert str(s) == dedent('''\ + xxx | 1 100 + x | 100 1''') + + s = TableForm(d, headings=(('xxx', 'x'), None)) + assert str(s) == ( + 'xxx | 1 100\n' + ' x | 100 1 ' + ) + + raises(ValueError, lambda: TableForm(d, alignments='clr')) + + #pad + s = str(TableForm([[None, "-", 2], [1]], pad='?')) + assert s == dedent('''\ + ? - 2 + 1 ? ?''') + + +def test_TableForm_latex(): + s = latex(TableForm([[0, x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]], + wipe_zeros=True, headings=("automatic", "automatic"))) + assert s == ( + '\\begin{tabular}{r l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & & $x^{3}$ \\\\\n' + '2 & $c$ & $\\frac{1}{4}$ \\\\\n' + '3 & $\\sqrt{x}$ & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) + s = latex(TableForm([[0, x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]], + wipe_zeros=True, headings=("automatic", "automatic"), alignments='l')) + assert s == ( + '\\begin{tabular}{r l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & & $x^{3}$ \\\\\n' + '2 & $c$ & $\\frac{1}{4}$ \\\\\n' + '3 & $\\sqrt{x}$ & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) + s = latex(TableForm([[0, x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]], + wipe_zeros=True, headings=("automatic", "automatic"), alignments='l'*3)) + assert s == ( + '\\begin{tabular}{l l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & & $x^{3}$ \\\\\n' + '2 & $c$ & $\\frac{1}{4}$ \\\\\n' + '3 & $\\sqrt{x}$ & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) + s = latex(TableForm([["a", x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]], + headings=("automatic", "automatic"))) + assert s == ( + '\\begin{tabular}{r l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & $a$ & $x^{3}$ \\\\\n' + '2 & $c$ & $\\frac{1}{4}$ \\\\\n' + '3 & $\\sqrt{x}$ & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) + s = latex(TableForm([["a", x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]], + formats=['(%s)', None], headings=("automatic", "automatic"))) + assert s == ( + '\\begin{tabular}{r l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & (a) & $x^{3}$ \\\\\n' + '2 & (c) & $\\frac{1}{4}$ \\\\\n' + '3 & (sqrt(x)) & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) + + def neg_in_paren(x, i, j): + if i % 2: + return ('(%s)' if x < 0 else '%s') % x + else: + pass # use default print + s = latex(TableForm([[-1, 2], [-3, 4]], + formats=[neg_in_paren]*2, headings=("automatic", "automatic"))) + assert s == ( + '\\begin{tabular}{r l l}\n' + ' & 1 & 2 \\\\\n' + '\\hline\n' + '1 & -1 & 2 \\\\\n' + '2 & (-3) & 4 \\\\\n' + '\\end{tabular}' + ) + s = latex(TableForm([["a", x**3], ["c", S.One/4], [sqrt(x), sin(x**2)]])) + assert s == ( + '\\begin{tabular}{l l}\n' + '$a$ & $x^{3}$ \\\\\n' + '$c$ & $\\frac{1}{4}$ \\\\\n' + '$\\sqrt{x}$ & $\\sin{\\left(x^{2} \\right)}$ \\\\\n' + '\\end{tabular}' + ) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tensorflow.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tensorflow.py new file mode 100644 index 0000000000000000000000000000000000000000..e9c92cd17b13e1148ebf83f13f66854b983491fe --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tensorflow.py @@ -0,0 +1,493 @@ +import random +from sympy.core.function import Derivative +from sympy.core.symbol import symbols +from sympy import Piecewise +from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct, ArrayAdd, \ + PermuteDims, ArrayDiagonal +from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt +from sympy.external import import_module +from sympy.functions import \ + Abs, ceiling, exp, floor, sign, sin, asin, sqrt, cos, \ + acos, tan, atan, atan2, cosh, acosh, sinh, asinh, tanh, atanh, \ + re, im, arg, erf, loggamma, log +from sympy.codegen.cfunctions import isnan, isinf +from sympy.matrices import Matrix, MatrixBase, eye, randMatrix +from sympy.matrices.expressions import \ + Determinant, HadamardProduct, Inverse, MatrixSymbol, Trace +from sympy.printing.tensorflow import tensorflow_code +from sympy.tensor.array.expressions.from_matrix_to_array import convert_matrix_to_array +from sympy.utilities.lambdify import lambdify +from sympy.testing.pytest import skip +from sympy.testing.pytest import XFAIL + + +tf = tensorflow = import_module("tensorflow") + +if tensorflow: + # Hide Tensorflow warnings + import os + os.environ['TF_CPP_MIN_LOG_LEVEL'] = '2' + + +M = MatrixSymbol("M", 3, 3) +N = MatrixSymbol("N", 3, 3) +P = MatrixSymbol("P", 3, 3) +Q = MatrixSymbol("Q", 3, 3) + +x, y, z, t = symbols("x y z t") + +if tf is not None: + llo = [list(range(i, i+3)) for i in range(0, 9, 3)] + m3x3 = tf.constant(llo) + m3x3sympy = Matrix(llo) + + +def _compare_tensorflow_matrix(variables, expr, use_float=False): + f = lambdify(variables, expr, 'tensorflow') + if not use_float: + random_matrices = [randMatrix(v.rows, v.cols) for v in variables] + else: + random_matrices = [randMatrix(v.rows, v.cols)/100. for v in variables] + + graph = tf.Graph() + r = None + with graph.as_default(): + random_variables = [eval(tensorflow_code(i)) for i in random_matrices] + session = tf.compat.v1.Session(graph=graph) + r = session.run(f(*random_variables)) + + e = expr.subs(dict(zip(variables, random_matrices))) + e = e.doit() + if e.is_Matrix: + if not isinstance(e, MatrixBase): + e = e.as_explicit() + e = e.tolist() + + if not use_float: + assert (r == e).all() + else: + r = [i for row in r for i in row] + e = [i for row in e for i in row] + assert all( + abs(a-b) < 10**-(4-int(log(abs(a), 10))) for a, b in zip(r, e)) + + +# Creating a custom inverse test. +# See https://github.com/sympy/sympy/issues/18469 +def _compare_tensorflow_matrix_inverse(variables, expr, use_float=False): + f = lambdify(variables, expr, 'tensorflow') + if not use_float: + random_matrices = [eye(v.rows, v.cols)*4 for v in variables] + else: + random_matrices = [eye(v.rows, v.cols)*3.14 for v in variables] + + graph = tf.Graph() + r = None + with graph.as_default(): + random_variables = [eval(tensorflow_code(i)) for i in random_matrices] + session = tf.compat.v1.Session(graph=graph) + r = session.run(f(*random_variables)) + + e = expr.subs(dict(zip(variables, random_matrices))) + e = e.doit() + if e.is_Matrix: + if not isinstance(e, MatrixBase): + e = e.as_explicit() + e = e.tolist() + + if not use_float: + assert (r == e).all() + else: + r = [i for row in r for i in row] + e = [i for row in e for i in row] + assert all( + abs(a-b) < 10**-(4-int(log(abs(a), 10))) for a, b in zip(r, e)) + + +def _compare_tensorflow_matrix_scalar(variables, expr): + f = lambdify(variables, expr, 'tensorflow') + random_matrices = [ + randMatrix(v.rows, v.cols).evalf() / 100 for v in variables] + + graph = tf.Graph() + r = None + with graph.as_default(): + random_variables = [eval(tensorflow_code(i)) for i in random_matrices] + session = tf.compat.v1.Session(graph=graph) + r = session.run(f(*random_variables)) + + e = expr.subs(dict(zip(variables, random_matrices))) + e = e.doit() + assert abs(r-e) < 10**-6 + + +def _compare_tensorflow_scalar( + variables, expr, rng=lambda: random.randint(0, 10)): + f = lambdify(variables, expr, 'tensorflow') + rvs = [rng() for v in variables] + + graph = tf.Graph() + r = None + with graph.as_default(): + tf_rvs = [eval(tensorflow_code(i)) for i in rvs] + session = tf.compat.v1.Session(graph=graph) + r = session.run(f(*tf_rvs)) + + e = expr.subs(dict(zip(variables, rvs))).evalf().doit() + assert abs(r-e) < 10**-6 + + +def _compare_tensorflow_relational( + variables, expr, rng=lambda: random.randint(0, 10)): + f = lambdify(variables, expr, 'tensorflow') + rvs = [rng() for v in variables] + + graph = tf.Graph() + r = None + with graph.as_default(): + tf_rvs = [eval(tensorflow_code(i)) for i in rvs] + session = tf.compat.v1.Session(graph=graph) + r = session.run(f(*tf_rvs)) + + e = expr.subs(dict(zip(variables, rvs))).doit() + assert r == e + + +def test_tensorflow_printing(): + assert tensorflow_code(eye(3)) == \ + "tensorflow.constant([[1, 0, 0], [0, 1, 0], [0, 0, 1]])" + + expr = Matrix([[x, sin(y)], [exp(z), -t]]) + assert tensorflow_code(expr) == \ + "tensorflow.Variable(" \ + "[[x, tensorflow.math.sin(y)]," \ + " [tensorflow.math.exp(z), -t]])" + + +# This (random) test is XFAIL because it fails occasionally +# See https://github.com/sympy/sympy/issues/18469 +@XFAIL +def test_tensorflow_math(): + if not tf: + skip("TensorFlow not installed") + + expr = Abs(x) + assert tensorflow_code(expr) == "tensorflow.math.abs(x)" + _compare_tensorflow_scalar((x,), expr) + + expr = sign(x) + assert tensorflow_code(expr) == "tensorflow.math.sign(x)" + _compare_tensorflow_scalar((x,), expr) + + expr = ceiling(x) + assert tensorflow_code(expr) == "tensorflow.math.ceil(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = floor(x) + assert tensorflow_code(expr) == "tensorflow.math.floor(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = exp(x) + assert tensorflow_code(expr) == "tensorflow.math.exp(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = sqrt(x) + assert tensorflow_code(expr) == "tensorflow.math.sqrt(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = x ** 4 + assert tensorflow_code(expr) == "tensorflow.math.pow(x, 4)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = cos(x) + assert tensorflow_code(expr) == "tensorflow.math.cos(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = acos(x) + assert tensorflow_code(expr) == "tensorflow.math.acos(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.uniform(0, 0.95)) + + expr = sin(x) + assert tensorflow_code(expr) == "tensorflow.math.sin(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = asin(x) + assert tensorflow_code(expr) == "tensorflow.math.asin(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = tan(x) + assert tensorflow_code(expr) == "tensorflow.math.tan(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = atan(x) + assert tensorflow_code(expr) == "tensorflow.math.atan(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = atan2(y, x) + assert tensorflow_code(expr) == "tensorflow.math.atan2(y, x)" + _compare_tensorflow_scalar((y, x), expr, rng=lambda: random.random()) + + expr = cosh(x) + assert tensorflow_code(expr) == "tensorflow.math.cosh(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.random()) + + expr = acosh(x) + assert tensorflow_code(expr) == "tensorflow.math.acosh(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.uniform(1, 2)) + + expr = sinh(x) + assert tensorflow_code(expr) == "tensorflow.math.sinh(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.uniform(1, 2)) + + expr = asinh(x) + assert tensorflow_code(expr) == "tensorflow.math.asinh(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.uniform(1, 2)) + + expr = tanh(x) + assert tensorflow_code(expr) == "tensorflow.math.tanh(x)" + _compare_tensorflow_scalar((x,), expr, rng=lambda: random.uniform(1, 2)) + + expr = atanh(x) + assert tensorflow_code(expr) == "tensorflow.math.atanh(x)" + _compare_tensorflow_scalar( + (x,), expr, rng=lambda: random.uniform(-.5, .5)) + + expr = erf(x) + assert tensorflow_code(expr) == "tensorflow.math.erf(x)" + _compare_tensorflow_scalar( + (x,), expr, rng=lambda: random.random()) + + expr = loggamma(x) + assert tensorflow_code(expr) == "tensorflow.math.lgamma(x)" + _compare_tensorflow_scalar( + (x,), expr, rng=lambda: random.random()) + + +def test_tensorflow_complexes(): + assert tensorflow_code(re(x)) == "tensorflow.math.real(x)" + assert tensorflow_code(im(x)) == "tensorflow.math.imag(x)" + assert tensorflow_code(arg(x)) == "tensorflow.math.angle(x)" + + +def test_tensorflow_relational(): + if not tf: + skip("TensorFlow not installed") + + expr = Eq(x, y) + assert tensorflow_code(expr) == "tensorflow.math.equal(x, y)" + _compare_tensorflow_relational((x, y), expr) + + expr = Ne(x, y) + assert tensorflow_code(expr) == "tensorflow.math.not_equal(x, y)" + _compare_tensorflow_relational((x, y), expr) + + expr = Ge(x, y) + assert tensorflow_code(expr) == "tensorflow.math.greater_equal(x, y)" + _compare_tensorflow_relational((x, y), expr) + + expr = Gt(x, y) + assert tensorflow_code(expr) == "tensorflow.math.greater(x, y)" + _compare_tensorflow_relational((x, y), expr) + + expr = Le(x, y) + assert tensorflow_code(expr) == "tensorflow.math.less_equal(x, y)" + _compare_tensorflow_relational((x, y), expr) + + expr = Lt(x, y) + assert tensorflow_code(expr) == "tensorflow.math.less(x, y)" + _compare_tensorflow_relational((x, y), expr) + + +# This (random) test is XFAIL because it fails occasionally +# See https://github.com/sympy/sympy/issues/18469 +@XFAIL +def test_tensorflow_matrices(): + if not tf: + skip("TensorFlow not installed") + + expr = M + assert tensorflow_code(expr) == "M" + _compare_tensorflow_matrix((M,), expr) + + expr = M + N + assert tensorflow_code(expr) == "tensorflow.math.add(M, N)" + _compare_tensorflow_matrix((M, N), expr) + + expr = M * N + assert tensorflow_code(expr) == "tensorflow.linalg.matmul(M, N)" + _compare_tensorflow_matrix((M, N), expr) + + expr = HadamardProduct(M, N) + assert tensorflow_code(expr) == "tensorflow.math.multiply(M, N)" + _compare_tensorflow_matrix((M, N), expr) + + expr = M*N*P*Q + assert tensorflow_code(expr) == \ + "tensorflow.linalg.matmul(" \ + "tensorflow.linalg.matmul(" \ + "tensorflow.linalg.matmul(M, N), P), Q)" + _compare_tensorflow_matrix((M, N, P, Q), expr) + + expr = M**3 + assert tensorflow_code(expr) == \ + "tensorflow.linalg.matmul(tensorflow.linalg.matmul(M, M), M)" + _compare_tensorflow_matrix((M,), expr) + + expr = Trace(M) + assert tensorflow_code(expr) == "tensorflow.linalg.trace(M)" + _compare_tensorflow_matrix((M,), expr) + + expr = Determinant(M) + assert tensorflow_code(expr) == "tensorflow.linalg.det(M)" + _compare_tensorflow_matrix_scalar((M,), expr) + + expr = Inverse(M) + assert tensorflow_code(expr) == "tensorflow.linalg.inv(M)" + _compare_tensorflow_matrix_inverse((M,), expr, use_float=True) + + expr = M.T + assert tensorflow_code(expr, tensorflow_version='1.14') == \ + "tensorflow.linalg.matrix_transpose(M)" + assert tensorflow_code(expr, tensorflow_version='1.13') == \ + "tensorflow.matrix_transpose(M)" + + _compare_tensorflow_matrix((M,), expr) + + +def test_codegen_einsum(): + if not tf: + skip("TensorFlow not installed") + + graph = tf.Graph() + with graph.as_default(): + session = tf.compat.v1.Session(graph=graph) + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + + cg = convert_matrix_to_array(M * N) + f = lambdify((M, N), cg, 'tensorflow') + + ma = tf.constant([[1, 2], [3, 4]]) + mb = tf.constant([[1,-2], [-1, 3]]) + y = session.run(f(ma, mb)) + c = session.run(tf.matmul(ma, mb)) + assert (y == c).all() + + +def test_codegen_extra(): + if not tf: + skip("TensorFlow not installed") + + graph = tf.Graph() + with graph.as_default(): + session = tf.compat.v1.Session() + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + P = MatrixSymbol("P", 2, 2) + Q = MatrixSymbol("Q", 2, 2) + ma = tf.constant([[1, 2], [3, 4]]) + mb = tf.constant([[1,-2], [-1, 3]]) + mc = tf.constant([[2, 0], [1, 2]]) + md = tf.constant([[1,-1], [4, 7]]) + + cg = ArrayTensorProduct(M, N) + assert tensorflow_code(cg) == \ + 'tensorflow.linalg.einsum("ab,cd", M, N)' + f = lambdify((M, N), cg, 'tensorflow') + y = session.run(f(ma, mb)) + c = session.run(tf.einsum("ij,kl", ma, mb)) + assert (y == c).all() + + cg = ArrayAdd(M, N) + assert tensorflow_code(cg) == 'tensorflow.math.add(M, N)' + f = lambdify((M, N), cg, 'tensorflow') + y = session.run(f(ma, mb)) + c = session.run(ma + mb) + assert (y == c).all() + + cg = ArrayAdd(M, N, P) + assert tensorflow_code(cg) == \ + 'tensorflow.math.add(tensorflow.math.add(M, N), P)' + f = lambdify((M, N, P), cg, 'tensorflow') + y = session.run(f(ma, mb, mc)) + c = session.run(ma + mb + mc) + assert (y == c).all() + + cg = ArrayAdd(M, N, P, Q) + assert tensorflow_code(cg) == \ + 'tensorflow.math.add(' \ + 'tensorflow.math.add(tensorflow.math.add(M, N), P), Q)' + f = lambdify((M, N, P, Q), cg, 'tensorflow') + y = session.run(f(ma, mb, mc, md)) + c = session.run(ma + mb + mc + md) + assert (y == c).all() + + cg = PermuteDims(M, [1, 0]) + assert tensorflow_code(cg) == 'tensorflow.transpose(M, [1, 0])' + f = lambdify((M,), cg, 'tensorflow') + y = session.run(f(ma)) + c = session.run(tf.transpose(ma)) + assert (y == c).all() + + cg = PermuteDims(ArrayTensorProduct(M, N), [1, 2, 3, 0]) + assert tensorflow_code(cg) == \ + 'tensorflow.transpose(' \ + 'tensorflow.linalg.einsum("ab,cd", M, N), [1, 2, 3, 0])' + f = lambdify((M, N), cg, 'tensorflow') + y = session.run(f(ma, mb)) + c = session.run(tf.transpose(tf.einsum("ab,cd", ma, mb), [1, 2, 3, 0])) + assert (y == c).all() + + cg = ArrayDiagonal(ArrayTensorProduct(M, N), (1, 2)) + assert tensorflow_code(cg) == \ + 'tensorflow.linalg.einsum("ab,bc->acb", M, N)' + f = lambdify((M, N), cg, 'tensorflow') + y = session.run(f(ma, mb)) + c = session.run(tf.einsum("ab,bc->acb", ma, mb)) + assert (y == c).all() + + +def test_MatrixElement_printing(): + A = MatrixSymbol("A", 1, 3) + B = MatrixSymbol("B", 1, 3) + C = MatrixSymbol("C", 1, 3) + + assert tensorflow_code(A[0, 0]) == "A[0, 0]" + assert tensorflow_code(3 * A[0, 0]) == "3*A[0, 0]" + + F = C[0, 0].subs(C, A - B) + assert tensorflow_code(F) == "(tensorflow.math.add((-1)*B, A))[0, 0]" + + +def test_tensorflow_Derivative(): + expr = Derivative(sin(x), x) + assert tensorflow_code(expr) == \ + "tensorflow.gradients(tensorflow.math.sin(x), x)[0]" + +def test_tensorflow_isnan_isinf(): + if not tf: + skip("TensorFlow not installed") + + # Test for isnan + x = symbols("x") + # Return 0 if x is of nan value, and 1 otherwise + expression = Piecewise((0.0, isnan(x)), (1.0, True)) + printed_code = tensorflow_code(expression) + expected_printed_code = "tensorflow.where(tensorflow.math.is_nan(x), 0.0, 1.0)" + assert tensorflow_code(expression) == expected_printed_code, f"Incorrect printed result {printed_code}, expected {expected_printed_code}" + for _input, _expected in [(float('nan'), 0.0), (float('inf'), 1.0), (float('-inf'), 1.0), (1.0, 1.0)]: + _output = lambdify((x), expression, modules="tensorflow")(x=tf.constant([_input])) + assert (_output == _expected).numpy().all() + + # Test for isinf + x = symbols("x") + # Return 0 if x is of nan value, and 1 otherwise + expression = Piecewise((0.0, isinf(x)), (1.0, True)) + printed_code = tensorflow_code(expression) + expected_printed_code = "tensorflow.where(tensorflow.math.is_inf(x), 0.0, 1.0)" + assert tensorflow_code(expression) == expected_printed_code, f"Incorrect printed result {printed_code}, expected {expected_printed_code}" + for _input, _expected in [(float('inf'), 0.0), (float('-inf'), 0.0), (float('nan'), 1.0), (1.0, 1.0)]: + _output = lambdify((x), expression, modules="tensorflow")(x=tf.constant([_input])) + assert (_output == _expected).numpy().all() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_theanocode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_theanocode.py new file mode 100644 index 0000000000000000000000000000000000000000..6ff40f78cb4de16149cb5e780756b7e32b574b71 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_theanocode.py @@ -0,0 +1,639 @@ +""" +Important note on tests in this module - the Theano printing functions use a +global cache by default, which means that tests using it will modify global +state and thus not be independent from each other. Instead of using the "cache" +keyword argument each time, this module uses the theano_code_ and +theano_function_ functions defined below which default to using a new, empty +cache instead. +""" + +import logging + +from sympy.external import import_module +from sympy.testing.pytest import raises, SKIP, warns_deprecated_sympy + +theanologger = logging.getLogger('theano.configdefaults') +theanologger.setLevel(logging.CRITICAL) +theano = import_module('theano') +theanologger.setLevel(logging.WARNING) + + +if theano: + import numpy as np + ts = theano.scalar + tt = theano.tensor + xt, yt, zt = [tt.scalar(name, 'floatX') for name in 'xyz'] + Xt, Yt, Zt = [tt.tensor('floatX', (False, False), name=n) for n in 'XYZ'] +else: + #bin/test will not execute any tests now + disabled = True + +import sympy as sy +from sympy.core.singleton import S +from sympy.abc import x, y, z, t +from sympy.printing.theanocode import (theano_code, dim_handling, + theano_function) + + +# Default set of matrix symbols for testing - make square so we can both +# multiply and perform elementwise operations between them. +X, Y, Z = [sy.MatrixSymbol(n, 4, 4) for n in 'XYZ'] + +# For testing AppliedUndef +f_t = sy.Function('f')(t) + + +def theano_code_(expr, **kwargs): + """ Wrapper for theano_code that uses a new, empty cache by default. """ + kwargs.setdefault('cache', {}) + with warns_deprecated_sympy(): + return theano_code(expr, **kwargs) + +def theano_function_(inputs, outputs, **kwargs): + """ Wrapper for theano_function that uses a new, empty cache by default. """ + kwargs.setdefault('cache', {}) + with warns_deprecated_sympy(): + return theano_function(inputs, outputs, **kwargs) + + +def fgraph_of(*exprs): + """ Transform SymPy expressions into Theano Computation. + + Parameters + ========== + exprs + SymPy expressions + + Returns + ======= + theano.gof.FunctionGraph + """ + outs = list(map(theano_code_, exprs)) + ins = theano.gof.graph.inputs(outs) + ins, outs = theano.gof.graph.clone(ins, outs) + return theano.gof.FunctionGraph(ins, outs) + + +def theano_simplify(fgraph): + """ Simplify a Theano Computation. + + Parameters + ========== + fgraph : theano.gof.FunctionGraph + + Returns + ======= + theano.gof.FunctionGraph + """ + mode = theano.compile.get_default_mode().excluding("fusion") + fgraph = fgraph.clone() + mode.optimizer.optimize(fgraph) + return fgraph + + +def theq(a, b): + """ Test two Theano objects for equality. + + Also accepts numeric types and lists/tuples of supported types. + + Note - debugprint() has a bug where it will accept numeric types but does + not respect the "file" argument and in this case and instead prints the number + to stdout and returns an empty string. This can lead to tests passing where + they should fail because any two numbers will always compare as equal. To + prevent this we treat numbers as a separate case. + """ + numeric_types = (int, float, np.number) + a_is_num = isinstance(a, numeric_types) + b_is_num = isinstance(b, numeric_types) + + # Compare numeric types using regular equality + if a_is_num or b_is_num: + if not (a_is_num and b_is_num): + return False + + return a == b + + # Compare sequences element-wise + a_is_seq = isinstance(a, (tuple, list)) + b_is_seq = isinstance(b, (tuple, list)) + + if a_is_seq or b_is_seq: + if not (a_is_seq and b_is_seq) or type(a) != type(b): + return False + + return list(map(theq, a)) == list(map(theq, b)) + + # Otherwise, assume debugprint() can handle it + astr = theano.printing.debugprint(a, file='str') + bstr = theano.printing.debugprint(b, file='str') + + # Check for bug mentioned above + for argname, argval, argstr in [('a', a, astr), ('b', b, bstr)]: + if argstr == '': + raise TypeError( + 'theano.printing.debugprint(%s) returned empty string ' + '(%s is instance of %r)' + % (argname, argname, type(argval)) + ) + + return astr == bstr + + +def test_example_symbols(): + """ + Check that the example symbols in this module print to their Theano + equivalents, as many of the other tests depend on this. + """ + assert theq(xt, theano_code_(x)) + assert theq(yt, theano_code_(y)) + assert theq(zt, theano_code_(z)) + assert theq(Xt, theano_code_(X)) + assert theq(Yt, theano_code_(Y)) + assert theq(Zt, theano_code_(Z)) + + +def test_Symbol(): + """ Test printing a Symbol to a theano variable. """ + xx = theano_code_(x) + assert isinstance(xx, (tt.TensorVariable, ts.ScalarVariable)) + assert xx.broadcastable == () + assert xx.name == x.name + + xx2 = theano_code_(x, broadcastables={x: (False,)}) + assert xx2.broadcastable == (False,) + assert xx2.name == x.name + +def test_MatrixSymbol(): + """ Test printing a MatrixSymbol to a theano variable. """ + XX = theano_code_(X) + assert isinstance(XX, tt.TensorVariable) + assert XX.broadcastable == (False, False) + +@SKIP # TODO - this is currently not checked but should be implemented +def test_MatrixSymbol_wrong_dims(): + """ Test MatrixSymbol with invalid broadcastable. """ + bcs = [(), (False,), (True,), (True, False), (False, True,), (True, True)] + for bc in bcs: + with raises(ValueError): + theano_code_(X, broadcastables={X: bc}) + +def test_AppliedUndef(): + """ Test printing AppliedUndef instance, which works similarly to Symbol. """ + ftt = theano_code_(f_t) + assert isinstance(ftt, tt.TensorVariable) + assert ftt.broadcastable == () + assert ftt.name == 'f_t' + + +def test_add(): + expr = x + y + comp = theano_code_(expr) + assert comp.owner.op == theano.tensor.add + +def test_trig(): + assert theq(theano_code_(sy.sin(x)), tt.sin(xt)) + assert theq(theano_code_(sy.tan(x)), tt.tan(xt)) + +def test_many(): + """ Test printing a complex expression with multiple symbols. """ + expr = sy.exp(x**2 + sy.cos(y)) * sy.log(2*z) + comp = theano_code_(expr) + expected = tt.exp(xt**2 + tt.cos(yt)) * tt.log(2*zt) + assert theq(comp, expected) + + +def test_dtype(): + """ Test specifying specific data types through the dtype argument. """ + for dtype in ['float32', 'float64', 'int8', 'int16', 'int32', 'int64']: + assert theano_code_(x, dtypes={x: dtype}).type.dtype == dtype + + # "floatX" type + assert theano_code_(x, dtypes={x: 'floatX'}).type.dtype in ('float32', 'float64') + + # Type promotion + assert theano_code_(x + 1, dtypes={x: 'float32'}).type.dtype == 'float32' + assert theano_code_(x + y, dtypes={x: 'float64', y: 'float32'}).type.dtype == 'float64' + + +def test_broadcastables(): + """ Test the "broadcastables" argument when printing symbol-like objects. """ + + # No restrictions on shape + for s in [x, f_t]: + for bc in [(), (False,), (True,), (False, False), (True, False)]: + assert theano_code_(s, broadcastables={s: bc}).broadcastable == bc + + # TODO - matrix broadcasting? + +def test_broadcasting(): + """ Test "broadcastable" attribute after applying element-wise binary op. """ + + expr = x + y + + cases = [ + [(), (), ()], + [(False,), (False,), (False,)], + [(True,), (False,), (False,)], + [(False, True), (False, False), (False, False)], + [(True, False), (False, False), (False, False)], + ] + + for bc1, bc2, bc3 in cases: + comp = theano_code_(expr, broadcastables={x: bc1, y: bc2}) + assert comp.broadcastable == bc3 + + +def test_MatMul(): + expr = X*Y*Z + expr_t = theano_code_(expr) + assert isinstance(expr_t.owner.op, tt.Dot) + assert theq(expr_t, Xt.dot(Yt).dot(Zt)) + +def test_Transpose(): + assert isinstance(theano_code_(X.T).owner.op, tt.DimShuffle) + +def test_MatAdd(): + expr = X+Y+Z + assert isinstance(theano_code_(expr).owner.op, tt.Elemwise) + + +def test_Rationals(): + assert theq(theano_code_(sy.Integer(2) / 3), tt.true_div(2, 3)) + assert theq(theano_code_(S.Half), tt.true_div(1, 2)) + +def test_Integers(): + assert theano_code_(sy.Integer(3)) == 3 + +def test_factorial(): + n = sy.Symbol('n') + assert theano_code_(sy.factorial(n)) + +def test_Derivative(): + simp = lambda expr: theano_simplify(fgraph_of(expr)) + assert theq(simp(theano_code_(sy.Derivative(sy.sin(x), x, evaluate=False))), + simp(theano.grad(tt.sin(xt), xt))) + + +def test_theano_function_simple(): + """ Test theano_function() with single output. """ + f = theano_function_([x, y], [x+y]) + assert f(2, 3) == 5 + +def test_theano_function_multi(): + """ Test theano_function() with multiple outputs. """ + f = theano_function_([x, y], [x+y, x-y]) + o1, o2 = f(2, 3) + assert o1 == 5 + assert o2 == -1 + +def test_theano_function_numpy(): + """ Test theano_function() vs Numpy implementation. """ + f = theano_function_([x, y], [x+y], dim=1, + dtypes={x: 'float64', y: 'float64'}) + assert np.linalg.norm(f([1, 2], [3, 4]) - np.asarray([4, 6])) < 1e-9 + + f = theano_function_([x, y], [x+y], dtypes={x: 'float64', y: 'float64'}, + dim=1) + xx = np.arange(3).astype('float64') + yy = 2*np.arange(3).astype('float64') + assert np.linalg.norm(f(xx, yy) - 3*np.arange(3)) < 1e-9 + + +def test_theano_function_matrix(): + m = sy.Matrix([[x, y], [z, x + y + z]]) + expected = np.array([[1.0, 2.0], [3.0, 1.0 + 2.0 + 3.0]]) + f = theano_function_([x, y, z], [m]) + np.testing.assert_allclose(f(1.0, 2.0, 3.0), expected) + f = theano_function_([x, y, z], [m], scalar=True) + np.testing.assert_allclose(f(1.0, 2.0, 3.0), expected) + f = theano_function_([x, y, z], [m, m]) + assert isinstance(f(1.0, 2.0, 3.0), type([])) + np.testing.assert_allclose(f(1.0, 2.0, 3.0)[0], expected) + np.testing.assert_allclose(f(1.0, 2.0, 3.0)[1], expected) + +def test_dim_handling(): + assert dim_handling([x], dim=2) == {x: (False, False)} + assert dim_handling([x, y], dims={x: 1, y: 2}) == {x: (False, True), + y: (False, False)} + assert dim_handling([x], broadcastables={x: (False,)}) == {x: (False,)} + +def test_theano_function_kwargs(): + """ + Test passing additional kwargs from theano_function() to theano.function(). + """ + import numpy as np + f = theano_function_([x, y, z], [x+y], dim=1, on_unused_input='ignore', + dtypes={x: 'float64', y: 'float64', z: 'float64'}) + assert np.linalg.norm(f([1, 2], [3, 4], [0, 0]) - np.asarray([4, 6])) < 1e-9 + + f = theano_function_([x, y, z], [x+y], + dtypes={x: 'float64', y: 'float64', z: 'float64'}, + dim=1, on_unused_input='ignore') + xx = np.arange(3).astype('float64') + yy = 2*np.arange(3).astype('float64') + zz = 2*np.arange(3).astype('float64') + assert np.linalg.norm(f(xx, yy, zz) - 3*np.arange(3)) < 1e-9 + +def test_theano_function_scalar(): + """ Test the "scalar" argument to theano_function(). """ + + args = [ + ([x, y], [x + y], None, [0]), # Single 0d output + ([X, Y], [X + Y], None, [2]), # Single 2d output + ([x, y], [x + y], {x: 0, y: 1}, [1]), # Single 1d output + ([x, y], [x + y, x - y], None, [0, 0]), # Two 0d outputs + ([x, y, X, Y], [x + y, X + Y], None, [0, 2]), # One 0d output, one 2d + ] + + # Create and test functions with and without the scalar setting + for inputs, outputs, in_dims, out_dims in args: + for scalar in [False, True]: + + f = theano_function_(inputs, outputs, dims=in_dims, scalar=scalar) + + # Check the theano_function attribute is set whether wrapped or not + assert isinstance(f.theano_function, theano.compile.function_module.Function) + + # Feed in inputs of the appropriate size and get outputs + in_values = [ + np.ones([1 if bc else 5 for bc in i.type.broadcastable]) + for i in f.theano_function.input_storage + ] + out_values = f(*in_values) + if not isinstance(out_values, list): + out_values = [out_values] + + # Check output types and shapes + assert len(out_dims) == len(out_values) + for d, value in zip(out_dims, out_values): + + if scalar and d == 0: + # Should have been converted to a scalar value + assert isinstance(value, np.number) + + else: + # Otherwise should be an array + assert isinstance(value, np.ndarray) + assert value.ndim == d + +def test_theano_function_bad_kwarg(): + """ + Passing an unknown keyword argument to theano_function() should raise an + exception. + """ + raises(Exception, lambda : theano_function_([x], [x+1], foobar=3)) + + +def test_slice(): + assert theano_code_(slice(1, 2, 3)) == slice(1, 2, 3) + + def theq_slice(s1, s2): + for attr in ['start', 'stop', 'step']: + a1 = getattr(s1, attr) + a2 = getattr(s2, attr) + if a1 is None or a2 is None: + if not (a1 is None or a2 is None): + return False + elif not theq(a1, a2): + return False + return True + + dtypes = {x: 'int32', y: 'int32'} + assert theq_slice(theano_code_(slice(x, y), dtypes=dtypes), slice(xt, yt)) + assert theq_slice(theano_code_(slice(1, x, 3), dtypes=dtypes), slice(1, xt, 3)) + +def test_MatrixSlice(): + from theano import Constant + + cache = {} + + n = sy.Symbol('n', integer=True) + X = sy.MatrixSymbol('X', n, n) + + Y = X[1:2:3, 4:5:6] + Yt = theano_code_(Y, cache=cache) + + s = ts.Scalar('int64') + assert tuple(Yt.owner.op.idx_list) == (slice(s, s, s), slice(s, s, s)) + assert Yt.owner.inputs[0] == theano_code_(X, cache=cache) + # == doesn't work in theano like it does in SymPy. You have to use + # equals. + assert all(Yt.owner.inputs[i].equals(Constant(s, i)) for i in range(1, 7)) + + k = sy.Symbol('k') + theano_code_(k, dtypes={k: 'int32'}) + start, stop, step = 4, k, 2 + Y = X[start:stop:step] + Yt = theano_code_(Y, dtypes={n: 'int32', k: 'int32'}) + # assert Yt.owner.op.idx_list[0].stop == kt + +def test_BlockMatrix(): + n = sy.Symbol('n', integer=True) + A, B, C, D = [sy.MatrixSymbol(name, n, n) for name in 'ABCD'] + At, Bt, Ct, Dt = map(theano_code_, (A, B, C, D)) + Block = sy.BlockMatrix([[A, B], [C, D]]) + Blockt = theano_code_(Block) + solutions = [tt.join(0, tt.join(1, At, Bt), tt.join(1, Ct, Dt)), + tt.join(1, tt.join(0, At, Ct), tt.join(0, Bt, Dt))] + assert any(theq(Blockt, solution) for solution in solutions) + +@SKIP +def test_BlockMatrix_Inverse_execution(): + k, n = 2, 4 + dtype = 'float32' + A = sy.MatrixSymbol('A', n, k) + B = sy.MatrixSymbol('B', n, n) + inputs = A, B + output = B.I*A + + cutsizes = {A: [(n//2, n//2), (k//2, k//2)], + B: [(n//2, n//2), (n//2, n//2)]} + cutinputs = [sy.blockcut(i, *cutsizes[i]) for i in inputs] + cutoutput = output.subs(dict(zip(inputs, cutinputs))) + + dtypes = dict(zip(inputs, [dtype]*len(inputs))) + f = theano_function_(inputs, [output], dtypes=dtypes, cache={}) + fblocked = theano_function_(inputs, [sy.block_collapse(cutoutput)], + dtypes=dtypes, cache={}) + + ninputs = [np.random.rand(*x.shape).astype(dtype) for x in inputs] + ninputs = [np.arange(n*k).reshape(A.shape).astype(dtype), + np.eye(n).astype(dtype)] + ninputs[1] += np.ones(B.shape)*1e-5 + + assert np.allclose(f(*ninputs), fblocked(*ninputs), rtol=1e-5) + +def test_DenseMatrix(): + t = sy.Symbol('theta') + for MatrixType in [sy.Matrix, sy.ImmutableMatrix]: + X = MatrixType([[sy.cos(t), -sy.sin(t)], [sy.sin(t), sy.cos(t)]]) + tX = theano_code_(X) + assert isinstance(tX, tt.TensorVariable) + assert tX.owner.op == tt.join_ + + +def test_cache_basic(): + """ Test single symbol-like objects are cached when printed by themselves. """ + + # Pairs of objects which should be considered equivalent with respect to caching + pairs = [ + (x, sy.Symbol('x')), + (X, sy.MatrixSymbol('X', *X.shape)), + (f_t, sy.Function('f')(sy.Symbol('t'))), + ] + + for s1, s2 in pairs: + cache = {} + st = theano_code_(s1, cache=cache) + + # Test hit with same instance + assert theano_code_(s1, cache=cache) is st + + # Test miss with same instance but new cache + assert theano_code_(s1, cache={}) is not st + + # Test hit with different but equivalent instance + assert theano_code_(s2, cache=cache) is st + +def test_global_cache(): + """ Test use of the global cache. """ + from sympy.printing.theanocode import global_cache + + backup = dict(global_cache) + try: + # Temporarily empty global cache + global_cache.clear() + + for s in [x, X, f_t]: + with warns_deprecated_sympy(): + st = theano_code(s) + assert theano_code(s) is st + + finally: + # Restore global cache + global_cache.update(backup) + +def test_cache_types_distinct(): + """ + Test that symbol-like objects of different types (Symbol, MatrixSymbol, + AppliedUndef) are distinguished by the cache even if they have the same + name. + """ + symbols = [sy.Symbol('f_t'), sy.MatrixSymbol('f_t', 4, 4), f_t] + + cache = {} # Single shared cache + printed = {} + + for s in symbols: + st = theano_code_(s, cache=cache) + assert st not in printed.values() + printed[s] = st + + # Check all printed objects are distinct + assert len(set(map(id, printed.values()))) == len(symbols) + + # Check retrieving + for s, st in printed.items(): + with warns_deprecated_sympy(): + assert theano_code(s, cache=cache) is st + +def test_symbols_are_created_once(): + """ + Test that a symbol is cached and reused when it appears in an expression + more than once. + """ + expr = sy.Add(x, x, evaluate=False) + comp = theano_code_(expr) + + assert theq(comp, xt + xt) + assert not theq(comp, xt + theano_code_(x)) + +def test_cache_complex(): + """ + Test caching on a complicated expression with multiple symbols appearing + multiple times. + """ + expr = x ** 2 + (y - sy.exp(x)) * sy.sin(z - x * y) + symbol_names = {s.name for s in expr.free_symbols} + expr_t = theano_code_(expr) + + # Iterate through variables in the Theano computational graph that the + # printed expression depends on + seen = set() + for v in theano.gof.graph.ancestors([expr_t]): + # Owner-less, non-constant variables should be our symbols + if v.owner is None and not isinstance(v, theano.gof.graph.Constant): + # Check it corresponds to a symbol and appears only once + assert v.name in symbol_names + assert v.name not in seen + seen.add(v.name) + + # Check all were present + assert seen == symbol_names + + +def test_Piecewise(): + # A piecewise linear + expr = sy.Piecewise((0, x<0), (x, x<2), (1, True)) # ___/III + result = theano_code_(expr) + assert result.owner.op == tt.switch + + expected = tt.switch(xt<0, 0, tt.switch(xt<2, xt, 1)) + assert theq(result, expected) + + expr = sy.Piecewise((x, x < 0)) + result = theano_code_(expr) + expected = tt.switch(xt < 0, xt, np.nan) + assert theq(result, expected) + + expr = sy.Piecewise((0, sy.And(x>0, x<2)), \ + (x, sy.Or(x>2, x<0))) + result = theano_code_(expr) + expected = tt.switch(tt.and_(xt>0,xt<2), 0, \ + tt.switch(tt.or_(xt>2, xt<0), xt, np.nan)) + assert theq(result, expected) + + +def test_Relationals(): + assert theq(theano_code_(sy.Eq(x, y)), tt.eq(xt, yt)) + # assert theq(theano_code_(sy.Ne(x, y)), tt.neq(xt, yt)) # TODO - implement + assert theq(theano_code_(x > y), xt > yt) + assert theq(theano_code_(x < y), xt < yt) + assert theq(theano_code_(x >= y), xt >= yt) + assert theq(theano_code_(x <= y), xt <= yt) + + +def test_complexfunctions(): + with warns_deprecated_sympy(): + xt, yt = theano_code_(x, dtypes={x:'complex128'}), theano_code_(y, dtypes={y: 'complex128'}) + from sympy.functions.elementary.complexes import conjugate + from theano.tensor import as_tensor_variable as atv + from theano.tensor import complex as cplx + with warns_deprecated_sympy(): + assert theq(theano_code_(y*conjugate(x)), yt*(xt.conj())) + assert theq(theano_code_((1+2j)*x), xt*(atv(1.0)+atv(2.0)*cplx(0,1))) + + +def test_constantfunctions(): + with warns_deprecated_sympy(): + tf = theano_function_([],[1+1j]) + assert(tf()==1+1j) + + +def test_Exp1(): + """ + Test that exp(1) prints without error and evaluates close to SymPy's E + """ + # sy.exp(1) should yield same instance of E as sy.E (singleton), but extra + # check added for sanity + e_a = sy.exp(1) + e_b = sy.E + + np.testing.assert_allclose(float(e_a), np.e) + np.testing.assert_allclose(float(e_b), np.e) + + e = theano_code_(e_a) + np.testing.assert_allclose(float(e_a), e.eval()) + + e = theano_code_(e_b) + np.testing.assert_allclose(float(e_b), e.eval()) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_torch.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_torch.py new file mode 100644 index 0000000000000000000000000000000000000000..8ce2c6cec75e03264f93b472a79eb073742e3486 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_torch.py @@ -0,0 +1,531 @@ +import random +import math + +from sympy import symbols, Derivative +from sympy.printing.pytorch import torch_code +from sympy import (eye, MatrixSymbol, Matrix) +from sympy.tensor.array import NDimArray +from sympy.tensor.array.expressions.array_expressions import ( + ArrayTensorProduct, ArrayAdd, + PermuteDims, ArrayDiagonal, _CodegenArrayAbstract) +from sympy.utilities.lambdify import lambdify +from sympy.core.relational import Eq, Ne, Ge, Gt, Le, Lt +from sympy.functions import \ + Abs, ceiling, exp, floor, sign, sin, asin, cos, \ + acos, tan, atan, atan2, cosh, acosh, sinh, asinh, tanh, atanh, \ + re, im, arg, erf, loggamma, sqrt +from sympy.testing.pytest import skip +from sympy.external import import_module +from sympy.matrices.expressions import \ + Determinant, HadamardProduct, Inverse, Trace +from sympy.matrices import randMatrix +from sympy.matrices import Identity, ZeroMatrix, OneMatrix +from sympy import conjugate, I +from sympy import Heaviside, gamma, polygamma + + + +torch = import_module("torch") + +M = MatrixSymbol("M", 3, 3) +N = MatrixSymbol("N", 3, 3) +P = MatrixSymbol("P", 3, 3) +Q = MatrixSymbol("Q", 3, 3) + +x, y, z, t = symbols("x y z t") + +if torch is not None: + llo = [list(range(i, i + 3)) for i in range(0, 9, 3)] + m3x3 = torch.tensor(llo, dtype=torch.float64) + m3x3sympy = Matrix(llo) + + +def _compare_torch_matrix(variables, expr): + f = lambdify(variables, expr, 'torch') + + random_matrices = [randMatrix(i.shape[0], i.shape[1]) for i in variables] + random_variables = [torch.tensor(i.tolist(), dtype=torch.float64) for i in random_matrices] + r = f(*random_variables) + e = expr.subs(dict(zip(variables, random_matrices))).doit() + + if isinstance(e, _CodegenArrayAbstract): + e = e.doit() + + if hasattr(e, 'is_number') and e.is_number: + if isinstance(r, torch.Tensor) and r.dim() == 0: + r = r.item() + e = float(e) + assert abs(r - e) < 1e-6 + return + + if e.is_Matrix or isinstance(e, NDimArray): + e = torch.tensor(e.tolist(), dtype=torch.float64) + assert torch.allclose(r, e, atol=1e-6) + else: + raise TypeError(f"Cannot compare {type(r)} with {type(e)}") + + +def _compare_torch_scalar(variables, expr, rng=lambda: random.uniform(-5, 5)): + f = lambdify(variables, expr, 'torch') + rvs = [rng() for v in variables] + t_rvs = [torch.tensor(i, dtype=torch.float64) for i in rvs] + r = f(*t_rvs) + if isinstance(r, torch.Tensor): + r = r.item() + e = expr.subs(dict(zip(variables, rvs))).doit() + assert abs(r - e) < 1e-6 + + +def _compare_torch_relational(variables, expr, rng=lambda: random.randint(0, 10)): + f = lambdify(variables, expr, 'torch') + rvs = [rng() for v in variables] + t_rvs = [torch.tensor(i, dtype=torch.float64) for i in rvs] + r = f(*t_rvs) + e = bool(expr.subs(dict(zip(variables, rvs))).doit()) + assert r.item() == e + + +def test_torch_math(): + if not torch: + skip("PyTorch not installed") + + expr = Abs(x) + assert torch_code(expr) == "torch.abs(x)" + f = lambdify(x, expr, 'torch') + ma = torch.tensor([[-1, 2, -3, -4]], dtype=torch.float64) + y_abs = f(ma) + c = torch.abs(ma) + assert torch.all(y_abs == c) + + expr = sign(x) + assert torch_code(expr) == "torch.sign(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-10, 10)) + + expr = ceiling(x) + assert torch_code(expr) == "torch.ceil(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = floor(x) + assert torch_code(expr) == "torch.floor(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = exp(x) + assert torch_code(expr) == "torch.exp(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-2, 2)) + + expr = sqrt(x) + assert torch_code(expr) == "torch.sqrt(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = x ** 4 + assert torch_code(expr) == "torch.pow(x, 4)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = cos(x) + assert torch_code(expr) == "torch.cos(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = acos(x) + assert torch_code(expr) == "torch.acos(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-0.99, 0.99)) + + expr = sin(x) + assert torch_code(expr) == "torch.sin(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.random()) + + expr = asin(x) + assert torch_code(expr) == "torch.asin(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-0.99, 0.99)) + + expr = tan(x) + assert torch_code(expr) == "torch.tan(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-1.5, 1.5)) + + expr = atan(x) + assert torch_code(expr) == "torch.atan(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-5, 5)) + + expr = atan2(y, x) + assert torch_code(expr) == "torch.atan2(y, x)" + _compare_torch_scalar((y, x), expr, rng=lambda: random.uniform(-5, 5)) + + expr = cosh(x) + assert torch_code(expr) == "torch.cosh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-2, 2)) + + expr = acosh(x) + assert torch_code(expr) == "torch.acosh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(1.1, 5)) + + expr = sinh(x) + assert torch_code(expr) == "torch.sinh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-2, 2)) + + expr = asinh(x) + assert torch_code(expr) == "torch.asinh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-5, 5)) + + expr = tanh(x) + assert torch_code(expr) == "torch.tanh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-2, 2)) + + expr = atanh(x) + assert torch_code(expr) == "torch.atanh(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-0.9, 0.9)) + + expr = erf(x) + assert torch_code(expr) == "torch.erf(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(-2, 2)) + + expr = loggamma(x) + assert torch_code(expr) == "torch.lgamma(x)" + _compare_torch_scalar((x,), expr, rng=lambda: random.uniform(0.5, 5)) + + +def test_torch_complexes(): + assert torch_code(re(x)) == "torch.real(x)" + assert torch_code(im(x)) == "torch.imag(x)" + assert torch_code(arg(x)) == "torch.angle(x)" + + +def test_torch_relational(): + if not torch: + skip("PyTorch not installed") + + expr = Eq(x, y) + assert torch_code(expr) == "torch.eq(x, y)" + _compare_torch_relational((x, y), expr) + + expr = Ne(x, y) + assert torch_code(expr) == "torch.ne(x, y)" + _compare_torch_relational((x, y), expr) + + expr = Ge(x, y) + assert torch_code(expr) == "torch.ge(x, y)" + _compare_torch_relational((x, y), expr) + + expr = Gt(x, y) + assert torch_code(expr) == "torch.gt(x, y)" + _compare_torch_relational((x, y), expr) + + expr = Le(x, y) + assert torch_code(expr) == "torch.le(x, y)" + _compare_torch_relational((x, y), expr) + + expr = Lt(x, y) + assert torch_code(expr) == "torch.lt(x, y)" + _compare_torch_relational((x, y), expr) + + +def test_torch_matrix(): + if torch is None: + skip("PyTorch not installed") + + expr = M + assert torch_code(expr) == "M" + f = lambdify((M,), expr, "torch") + eye_mat = eye(3) + eye_tensor = torch.tensor(eye_mat.tolist(), dtype=torch.float64) + assert torch.allclose(f(eye_tensor), eye_tensor) + + expr = M * N + assert torch_code(expr) == "torch.matmul(M, N)" + _compare_torch_matrix((M, N), expr) + + expr = M ** 3 + assert torch_code(expr) == "torch.mm(torch.mm(M, M), M)" + _compare_torch_matrix((M,), expr) + + expr = M * N * P * Q + assert torch_code(expr) == "torch.matmul(torch.matmul(torch.matmul(M, N), P), Q)" + _compare_torch_matrix((M, N, P, Q), expr) + + expr = Trace(M) + assert torch_code(expr) == "torch.trace(M)" + _compare_torch_matrix((M,), expr) + + expr = Determinant(M) + assert torch_code(expr) == "torch.det(M)" + _compare_torch_matrix((M,), expr) + + expr = HadamardProduct(M, N) + assert torch_code(expr) == "torch.mul(M, N)" + _compare_torch_matrix((M, N), expr) + + expr = Inverse(M) + assert torch_code(expr) == "torch.linalg.inv(M)" + + # For inverse, use a matrix that's guaranteed to be invertible + eye_mat = eye(3) + eye_tensor = torch.tensor(eye_mat.tolist(), dtype=torch.float64) + f = lambdify((M,), expr, "torch") + result = f(eye_tensor) + expected = torch.linalg.inv(eye_tensor) + assert torch.allclose(result, expected) + + +def test_torch_array_operations(): + if not torch: + skip("PyTorch not installed") + + M = MatrixSymbol("M", 2, 2) + N = MatrixSymbol("N", 2, 2) + P = MatrixSymbol("P", 2, 2) + Q = MatrixSymbol("Q", 2, 2) + + ma = torch.tensor([[1., 2.], [3., 4.]], dtype=torch.float64) + mb = torch.tensor([[1., -2.], [-1., 3.]], dtype=torch.float64) + mc = torch.tensor([[2., 0.], [1., 2.]], dtype=torch.float64) + md = torch.tensor([[1., -1.], [4., 7.]], dtype=torch.float64) + + cg = ArrayTensorProduct(M, N) + assert torch_code(cg) == 'torch.einsum("ab,cd", M, N)' + f = lambdify((M, N), cg, 'torch') + y = f(ma, mb) + c = torch.einsum("ij,kl", ma, mb) + assert torch.allclose(y, c) + + cg = ArrayAdd(M, N) + assert torch_code(cg) == 'torch.add(M, N)' + f = lambdify((M, N), cg, 'torch') + y = f(ma, mb) + c = ma + mb + assert torch.allclose(y, c) + + cg = ArrayAdd(M, N, P) + assert torch_code(cg) == 'torch.add(torch.add(M, N), P)' + f = lambdify((M, N, P), cg, 'torch') + y = f(ma, mb, mc) + c = ma + mb + mc + assert torch.allclose(y, c) + + cg = ArrayAdd(M, N, P, Q) + assert torch_code(cg) == 'torch.add(torch.add(torch.add(M, N), P), Q)' + f = lambdify((M, N, P, Q), cg, 'torch') + y = f(ma, mb, mc, md) + c = ma + mb + mc + md + assert torch.allclose(y, c) + + cg = PermuteDims(M, [1, 0]) + assert torch_code(cg) == 'M.permute(1, 0)' + f = lambdify((M,), cg, 'torch') + y = f(ma) + c = ma.T + assert torch.allclose(y, c) + + cg = PermuteDims(ArrayTensorProduct(M, N), [1, 2, 3, 0]) + assert torch_code(cg) == 'torch.einsum("ab,cd", M, N).permute(1, 2, 3, 0)' + f = lambdify((M, N), cg, 'torch') + y = f(ma, mb) + c = torch.einsum("ab,cd", ma, mb).permute(1, 2, 3, 0) + assert torch.allclose(y, c) + + cg = ArrayDiagonal(ArrayTensorProduct(M, N), (1, 2)) + assert torch_code(cg) == 'torch.einsum("ab,bc->acb", M, N)' + f = lambdify((M, N), cg, 'torch') + y = f(ma, mb) + c = torch.einsum("ab,bc->acb", ma, mb) + assert torch.allclose(y, c) + + +def test_torch_derivative(): + """Test derivative handling.""" + expr = Derivative(sin(x), x) + assert torch_code(expr) == 'torch.autograd.grad(torch.sin(x), x)[0]' + + +def test_torch_printing_dtype(): + if not torch: + skip("PyTorch not installed") + + # matrix printing with default dtype + expr = Matrix([[x, sin(y)], [exp(z), -t]]) + assert "dtype=torch.float64" in torch_code(expr) + + # explicit dtype + assert "dtype=torch.float32" in torch_code(expr, dtype="torch.float32") + + # with requires_grad + result = torch_code(expr, requires_grad=True) + assert "requires_grad=True" in result + assert "dtype=torch.float64" in result + + # both + result = torch_code(expr, requires_grad=True, dtype="torch.float32") + assert "requires_grad=True" in result + assert "dtype=torch.float32" in result + + +def test_requires_grad(): + if not torch: + skip("PyTorch not installed") + + expr = sin(x) + cos(y) + f = lambdify([x, y], expr, 'torch') + + # make sure the gradients flow + x_val = torch.tensor(1.0, requires_grad=True) + y_val = torch.tensor(2.0, requires_grad=True) + result = f(x_val, y_val) + assert result.requires_grad + result.backward() + + # x_val.grad should be cos(x_val) which is close to cos(1.0) + assert abs(x_val.grad.item() - float(cos(1.0).evalf())) < 1e-6 + + # y_val.grad should be -sin(y_val) which is close to -sin(2.0) + assert abs(y_val.grad.item() - float(-sin(2.0).evalf())) < 1e-6 + + +def test_torch_multi_variable_derivatives(): + if not torch: + skip("PyTorch not installed") + + x, y, z = symbols("x y z") + + expr = Derivative(sin(x), x) + assert torch_code(expr) == "torch.autograd.grad(torch.sin(x), x)[0]" + + expr = Derivative(sin(x), (x, 2)) + assert torch_code( + expr) == "torch.autograd.grad(torch.autograd.grad(torch.sin(x), x, create_graph=True)[0], x, create_graph=True)[0]" + + expr = Derivative(sin(x * y), x, y) + result = torch_code(expr) + expected = "torch.autograd.grad(torch.autograd.grad(torch.sin(x*y), x, create_graph=True)[0], y, create_graph=True)[0]" + normalized_result = result.replace(" ", "") + normalized_expected = expected.replace(" ", "") + assert normalized_result == normalized_expected + + expr = Derivative(sin(x), x, x) + result = torch_code(expr) + expected = "torch.autograd.grad(torch.autograd.grad(torch.sin(x), x, create_graph=True)[0], x, create_graph=True)[0]" + assert result == expected + + expr = Derivative(sin(x * y * z), x, (y, 2), z) + result = torch_code(expr) + expected = "torch.autograd.grad(torch.autograd.grad(torch.autograd.grad(torch.autograd.grad(torch.sin(x*y*z), x, create_graph=True)[0], y, create_graph=True)[0], y, create_graph=True)[0], z, create_graph=True)[0]" + normalized_result = result.replace(" ", "") + normalized_expected = expected.replace(" ", "") + assert normalized_result == normalized_expected + + +def test_torch_derivative_lambdify(): + if not torch: + skip("PyTorch not installed") + + x = symbols("x") + y = symbols("y") + + expr = Derivative(x ** 2, x) + f = lambdify(x, expr, 'torch') + x_val = torch.tensor(2.0, requires_grad=True) + result = f(x_val) + assert torch.isclose(result, torch.tensor(4.0)) + + expr = Derivative(sin(x), (x, 2)) + f = lambdify(x, expr, 'torch') + # Second derivative of sin(x) at x=0 is 0, not -1 + x_val = torch.tensor(0.0, requires_grad=True) + result = f(x_val) + assert torch.isclose(result, torch.tensor(0.0), atol=1e-5) + + x_val = torch.tensor(math.pi / 2, requires_grad=True) + result = f(x_val) + assert torch.isclose(result, torch.tensor(-1.0), atol=1e-5) + + expr = Derivative(x * y ** 2, x, y) + f = lambdify((x, y), expr, 'torch') + x_val = torch.tensor(2.0, requires_grad=True) + y_val = torch.tensor(3.0, requires_grad=True) + result = f(x_val, y_val) + assert torch.isclose(result, torch.tensor(6.0)) + + +def test_torch_special_matrices(): + if not torch: + skip("PyTorch not installed") + + expr = Identity(3) + assert torch_code(expr) == "torch.eye(3)" + + n = symbols("n") + expr = Identity(n) + assert torch_code(expr) == "torch.eye(n, n)" + + expr = ZeroMatrix(2, 3) + assert torch_code(expr) == "torch.zeros((2, 3))" + + m, n = symbols("m n") + expr = ZeroMatrix(m, n) + assert torch_code(expr) == "torch.zeros((m, n))" + + expr = OneMatrix(2, 3) + assert torch_code(expr) == "torch.ones((2, 3))" + + expr = OneMatrix(m, n) + assert torch_code(expr) == "torch.ones((m, n))" + + +def test_torch_special_matrices_lambdify(): + if not torch: + skip("PyTorch not installed") + + expr = Identity(3) + f = lambdify([], expr, 'torch') + result = f() + expected = torch.eye(3) + assert torch.allclose(result, expected) + + expr = ZeroMatrix(2, 3) + f = lambdify([], expr, 'torch') + result = f() + expected = torch.zeros((2, 3)) + assert torch.allclose(result, expected) + + expr = OneMatrix(2, 3) + f = lambdify([], expr, 'torch') + result = f() + expected = torch.ones((2, 3)) + assert torch.allclose(result, expected) + + +def test_torch_complex_operations(): + if not torch: + skip("PyTorch not installed") + + expr = conjugate(x) + assert torch_code(expr) == "torch.conj(x)" + + # SymPy distributes conjugate over addition and applies specific rules for each term + expr = conjugate(sin(x) + I * cos(y)) + assert torch_code(expr) == "torch.sin(torch.conj(x)) - 1j*torch.cos(torch.conj(y))" + + expr = I + assert torch_code(expr) == "1j" + + expr = 2 * I + x + assert torch_code(expr) == "x + 2*1j" + + expr = exp(I * x) + assert torch_code(expr) == "torch.exp(1j*x)" + + +def test_torch_special_functions(): + if not torch: + skip("PyTorch not installed") + + expr = Heaviside(x) + assert torch_code(expr) == "torch.heaviside(x, 1/2)" + + expr = Heaviside(x, 0) + assert torch_code(expr) == "torch.heaviside(x, 0)" + + expr = gamma(x) + assert torch_code(expr) == "torch.special.gamma(x)" + + expr = polygamma(0, x) # Use polygamma instead of digamma because sympy will default to that anyway + assert torch_code(expr) == "torch.special.digamma(x)" + + expr = gamma(sin(x)) + assert torch_code(expr) == "torch.special.gamma(torch.sin(x))" diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tree.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tree.py new file mode 100644 index 0000000000000000000000000000000000000000..cf116d0cac5d38f225815fcd2d4ac90cd0dd96d7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tests/test_tree.py @@ -0,0 +1,196 @@ +from sympy.printing.tree import tree +from sympy.testing.pytest import XFAIL + + +# Remove this flag after making _assumptions cache deterministic. +@XFAIL +def test_print_tree_MatAdd(): + from sympy.matrices.expressions import MatrixSymbol + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + + test_str = [ + 'MatAdd: A + B\n', + 'algebraic: False\n', + 'commutative: False\n', + 'complex: False\n', + 'composite: False\n', + 'even: False\n', + 'extended_negative: False\n', + 'extended_nonnegative: False\n', + 'extended_nonpositive: False\n', + 'extended_nonzero: False\n', + 'extended_positive: False\n', + 'extended_real: False\n', + 'imaginary: False\n', + 'integer: False\n', + 'irrational: False\n', + 'negative: False\n', + 'noninteger: False\n', + 'nonnegative: False\n', + 'nonpositive: False\n', + 'nonzero: False\n', + 'odd: False\n', + 'positive: False\n', + 'prime: False\n', + 'rational: False\n', + 'real: False\n', + 'transcendental: False\n', + 'zero: False\n', + '+-MatrixSymbol: A\n', + '| algebraic: False\n', + '| commutative: False\n', + '| complex: False\n', + '| composite: False\n', + '| even: False\n', + '| extended_negative: False\n', + '| extended_nonnegative: False\n', + '| extended_nonpositive: False\n', + '| extended_nonzero: False\n', + '| extended_positive: False\n', + '| extended_real: False\n', + '| imaginary: False\n', + '| integer: False\n', + '| irrational: False\n', + '| negative: False\n', + '| noninteger: False\n', + '| nonnegative: False\n', + '| nonpositive: False\n', + '| nonzero: False\n', + '| odd: False\n', + '| positive: False\n', + '| prime: False\n', + '| rational: False\n', + '| real: False\n', + '| transcendental: False\n', + '| zero: False\n', + '| +-Symbol: A\n', + '| | commutative: True\n', + '| +-Integer: 3\n', + '| | algebraic: True\n', + '| | commutative: True\n', + '| | complex: True\n', + '| | extended_negative: False\n', + '| | extended_nonnegative: True\n', + '| | extended_real: True\n', + '| | finite: True\n', + '| | hermitian: True\n', + '| | imaginary: False\n', + '| | infinite: False\n', + '| | integer: True\n', + '| | irrational: False\n', + '| | negative: False\n', + '| | noninteger: False\n', + '| | nonnegative: True\n', + '| | rational: True\n', + '| | real: True\n', + '| | transcendental: False\n', + '| +-Integer: 3\n', + '| algebraic: True\n', + '| commutative: True\n', + '| complex: True\n', + '| extended_negative: False\n', + '| extended_nonnegative: True\n', + '| extended_real: True\n', + '| finite: True\n', + '| hermitian: True\n', + '| imaginary: False\n', + '| infinite: False\n', + '| integer: True\n', + '| irrational: False\n', + '| negative: False\n', + '| noninteger: False\n', + '| nonnegative: True\n', + '| rational: True\n', + '| real: True\n', + '| transcendental: False\n', + '+-MatrixSymbol: B\n', + ' algebraic: False\n', + ' commutative: False\n', + ' complex: False\n', + ' composite: False\n', + ' even: False\n', + ' extended_negative: False\n', + ' extended_nonnegative: False\n', + ' extended_nonpositive: False\n', + ' extended_nonzero: False\n', + ' extended_positive: False\n', + ' extended_real: False\n', + ' imaginary: False\n', + ' integer: False\n', + ' irrational: False\n', + ' negative: False\n', + ' noninteger: False\n', + ' nonnegative: False\n', + ' nonpositive: False\n', + ' nonzero: False\n', + ' odd: False\n', + ' positive: False\n', + ' prime: False\n', + ' rational: False\n', + ' real: False\n', + ' transcendental: False\n', + ' zero: False\n', + ' +-Symbol: B\n', + ' | commutative: True\n', + ' +-Integer: 3\n', + ' | algebraic: True\n', + ' | commutative: True\n', + ' | complex: True\n', + ' | extended_negative: False\n', + ' | extended_nonnegative: True\n', + ' | extended_real: True\n', + ' | finite: True\n', + ' | hermitian: True\n', + ' | imaginary: False\n', + ' | infinite: False\n', + ' | integer: True\n', + ' | irrational: False\n', + ' | negative: False\n', + ' | noninteger: False\n', + ' | nonnegative: True\n', + ' | rational: True\n', + ' | real: True\n', + ' | transcendental: False\n', + ' +-Integer: 3\n', + ' algebraic: True\n', + ' commutative: True\n', + ' complex: True\n', + ' extended_negative: False\n', + ' extended_nonnegative: True\n', + ' extended_real: True\n', + ' finite: True\n', + ' hermitian: True\n', + ' imaginary: False\n', + ' infinite: False\n', + ' integer: True\n', + ' irrational: False\n', + ' negative: False\n', + ' noninteger: False\n', + ' nonnegative: True\n', + ' rational: True\n', + ' real: True\n', + ' transcendental: False\n' + ] + + assert tree(A + B) == "".join(test_str) + + +def test_print_tree_MatAdd_noassumptions(): + from sympy.matrices.expressions import MatrixSymbol + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + + test_str = \ +"""MatAdd: A + B ++-MatrixSymbol: A +| +-Str: A +| +-Integer: 3 +| +-Integer: 3 ++-MatrixSymbol: B + +-Str: B + +-Integer: 3 + +-Integer: 3 +""" + + assert tree(A + B, assumptions=False) == test_str diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/theanocode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/theanocode.py new file mode 100644 index 0000000000000000000000000000000000000000..dce908865d426dabede2b6749ad944e5a420e4cf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/theanocode.py @@ -0,0 +1,571 @@ +""" +.. deprecated:: 1.8 + + ``sympy.printing.theanocode`` is deprecated. Theano has been renamed to + Aesara. Use ``sympy.printing.aesaracode`` instead. See + :ref:`theanocode-deprecated` for more information. + +""" +from __future__ import annotations +import math +from typing import Any + +from sympy.external import import_module +from sympy.printing.printer import Printer +from sympy.utilities.iterables import is_sequence +import sympy +from functools import partial + +from sympy.utilities.decorator import doctest_depends_on +from sympy.utilities.exceptions import sympy_deprecation_warning + + +__doctest_requires__ = {('theano_function',): ['theano']} + + +theano = import_module('theano') + + +if theano: + ts = theano.scalar + tt = theano.tensor + from theano.sandbox import linalg as tlinalg + + mapping = { + sympy.Add: tt.add, + sympy.Mul: tt.mul, + sympy.Abs: tt.abs_, + sympy.sign: tt.sgn, + sympy.ceiling: tt.ceil, + sympy.floor: tt.floor, + sympy.log: tt.log, + sympy.exp: tt.exp, + sympy.sqrt: tt.sqrt, + sympy.cos: tt.cos, + sympy.acos: tt.arccos, + sympy.sin: tt.sin, + sympy.asin: tt.arcsin, + sympy.tan: tt.tan, + sympy.atan: tt.arctan, + sympy.atan2: tt.arctan2, + sympy.cosh: tt.cosh, + sympy.acosh: tt.arccosh, + sympy.sinh: tt.sinh, + sympy.asinh: tt.arcsinh, + sympy.tanh: tt.tanh, + sympy.atanh: tt.arctanh, + sympy.re: tt.real, + sympy.im: tt.imag, + sympy.arg: tt.angle, + sympy.erf: tt.erf, + sympy.gamma: tt.gamma, + sympy.loggamma: tt.gammaln, + sympy.Pow: tt.pow, + sympy.Eq: tt.eq, + sympy.StrictGreaterThan: tt.gt, + sympy.StrictLessThan: tt.lt, + sympy.LessThan: tt.le, + sympy.GreaterThan: tt.ge, + sympy.And: tt.and_, + sympy.Or: tt.or_, + sympy.Max: tt.maximum, # SymPy accept >2 inputs, Theano only 2 + sympy.Min: tt.minimum, # SymPy accept >2 inputs, Theano only 2 + sympy.conjugate: tt.conj, + sympy.core.numbers.ImaginaryUnit: lambda:tt.complex(0,1), + # Matrices + sympy.MatAdd: tt.Elemwise(ts.add), + sympy.HadamardProduct: tt.Elemwise(ts.mul), + sympy.Trace: tlinalg.trace, + sympy.Determinant : tlinalg.det, + sympy.Inverse: tlinalg.matrix_inverse, + sympy.Transpose: tt.DimShuffle((False, False), [1, 0]), + } + + +class TheanoPrinter(Printer): + """ Code printer which creates Theano symbolic expression graphs. + + Parameters + ========== + + cache : dict + Cache dictionary to use. If None (default) will use + the global cache. To create a printer which does not depend on or alter + global state pass an empty dictionary. Note: the dictionary is not + copied on initialization of the printer and will be updated in-place, + so using the same dict object when creating multiple printers or making + multiple calls to :func:`.theano_code` or :func:`.theano_function` means + the cache is shared between all these applications. + + Attributes + ========== + + cache : dict + A cache of Theano variables which have been created for SymPy + symbol-like objects (e.g. :class:`sympy.core.symbol.Symbol` or + :class:`sympy.matrices.expressions.MatrixSymbol`). This is used to + ensure that all references to a given symbol in an expression (or + multiple expressions) are printed as the same Theano variable, which is + created only once. Symbols are differentiated only by name and type. The + format of the cache's contents should be considered opaque to the user. + """ + printmethod = "_theano" + + def __init__(self, *args, **kwargs): + self.cache = kwargs.pop('cache', {}) + super().__init__(*args, **kwargs) + + def _get_key(self, s, name=None, dtype=None, broadcastable=None): + """ Get the cache key for a SymPy object. + + Parameters + ========== + + s : sympy.core.basic.Basic + SymPy object to get key for. + + name : str + Name of object, if it does not have a ``name`` attribute. + """ + + if name is None: + name = s.name + + return (name, type(s), s.args, dtype, broadcastable) + + def _get_or_create(self, s, name=None, dtype=None, broadcastable=None): + """ + Get the Theano variable for a SymPy symbol from the cache, or create it + if it does not exist. + """ + + # Defaults + if name is None: + name = s.name + if dtype is None: + dtype = 'floatX' + if broadcastable is None: + broadcastable = () + + key = self._get_key(s, name, dtype=dtype, broadcastable=broadcastable) + + if key in self.cache: + return self.cache[key] + + value = tt.tensor(name=name, dtype=dtype, broadcastable=broadcastable) + self.cache[key] = value + return value + + def _print_Symbol(self, s, **kwargs): + dtype = kwargs.get('dtypes', {}).get(s) + bc = kwargs.get('broadcastables', {}).get(s) + return self._get_or_create(s, dtype=dtype, broadcastable=bc) + + def _print_AppliedUndef(self, s, **kwargs): + name = str(type(s)) + '_' + str(s.args[0]) + dtype = kwargs.get('dtypes', {}).get(s) + bc = kwargs.get('broadcastables', {}).get(s) + return self._get_or_create(s, name=name, dtype=dtype, broadcastable=bc) + + def _print_Basic(self, expr, **kwargs): + op = mapping[type(expr)] + children = [self._print(arg, **kwargs) for arg in expr.args] + return op(*children) + + def _print_Number(self, n, **kwargs): + # Integers already taken care of below, interpret as float + return float(n.evalf()) + + def _print_MatrixSymbol(self, X, **kwargs): + dtype = kwargs.get('dtypes', {}).get(X) + return self._get_or_create(X, dtype=dtype, broadcastable=(None, None)) + + def _print_DenseMatrix(self, X, **kwargs): + if not hasattr(tt, 'stacklists'): + raise NotImplementedError( + "Matrix translation not yet supported in this version of Theano") + + return tt.stacklists([ + [self._print(arg, **kwargs) for arg in L] + for L in X.tolist() + ]) + + _print_ImmutableMatrix = _print_ImmutableDenseMatrix = _print_DenseMatrix + + def _print_MatMul(self, expr, **kwargs): + children = [self._print(arg, **kwargs) for arg in expr.args] + result = children[0] + for child in children[1:]: + result = tt.dot(result, child) + return result + + def _print_MatPow(self, expr, **kwargs): + children = [self._print(arg, **kwargs) for arg in expr.args] + result = 1 + if isinstance(children[1], int) and children[1] > 0: + for i in range(children[1]): + result = tt.dot(result, children[0]) + else: + raise NotImplementedError('''Only non-negative integer + powers of matrices can be handled by Theano at the moment''') + return result + + def _print_MatrixSlice(self, expr, **kwargs): + parent = self._print(expr.parent, **kwargs) + rowslice = self._print(slice(*expr.rowslice), **kwargs) + colslice = self._print(slice(*expr.colslice), **kwargs) + return parent[rowslice, colslice] + + def _print_BlockMatrix(self, expr, **kwargs): + nrows, ncols = expr.blocks.shape + blocks = [[self._print(expr.blocks[r, c], **kwargs) + for c in range(ncols)] + for r in range(nrows)] + return tt.join(0, *[tt.join(1, *row) for row in blocks]) + + + def _print_slice(self, expr, **kwargs): + return slice(*[self._print(i, **kwargs) + if isinstance(i, sympy.Basic) else i + for i in (expr.start, expr.stop, expr.step)]) + + def _print_Pi(self, expr, **kwargs): + return math.pi + + def _print_Exp1(self, expr, **kwargs): + return ts.exp(1) + + def _print_Piecewise(self, expr, **kwargs): + import numpy as np + e, cond = expr.args[0].args # First condition and corresponding value + + # Print conditional expression and value for first condition + p_cond = self._print(cond, **kwargs) + p_e = self._print(e, **kwargs) + + # One condition only + if len(expr.args) == 1: + # Return value if condition else NaN + return tt.switch(p_cond, p_e, np.nan) + + # Return value_1 if condition_1 else evaluate remaining conditions + p_remaining = self._print(sympy.Piecewise(*expr.args[1:]), **kwargs) + return tt.switch(p_cond, p_e, p_remaining) + + def _print_Rational(self, expr, **kwargs): + return tt.true_div(self._print(expr.p, **kwargs), + self._print(expr.q, **kwargs)) + + def _print_Integer(self, expr, **kwargs): + return expr.p + + def _print_factorial(self, expr, **kwargs): + return self._print(sympy.gamma(expr.args[0] + 1), **kwargs) + + def _print_Derivative(self, deriv, **kwargs): + rv = self._print(deriv.expr, **kwargs) + for var in deriv.variables: + var = self._print(var, **kwargs) + rv = tt.Rop(rv, var, tt.ones_like(var)) + return rv + + def emptyPrinter(self, expr): + return expr + + def doprint(self, expr, dtypes=None, broadcastables=None): + """ Convert a SymPy expression to a Theano graph variable. + + The ``dtypes`` and ``broadcastables`` arguments are used to specify the + data type, dimension, and broadcasting behavior of the Theano variables + corresponding to the free symbols in ``expr``. Each is a mapping from + SymPy symbols to the value of the corresponding argument to + ``theano.tensor.Tensor``. + + See the corresponding `documentation page`__ for more information on + broadcasting in Theano. + + .. __: http://deeplearning.net/software/theano/tutorial/broadcasting.html + + Parameters + ========== + + expr : sympy.core.expr.Expr + SymPy expression to print. + + dtypes : dict + Mapping from SymPy symbols to Theano datatypes to use when creating + new Theano variables for those symbols. Corresponds to the ``dtype`` + argument to ``theano.tensor.Tensor``. Defaults to ``'floatX'`` + for symbols not included in the mapping. + + broadcastables : dict + Mapping from SymPy symbols to the value of the ``broadcastable`` + argument to ``theano.tensor.Tensor`` to use when creating Theano + variables for those symbols. Defaults to the empty tuple for symbols + not included in the mapping (resulting in a scalar). + + Returns + ======= + + theano.gof.graph.Variable + A variable corresponding to the expression's value in a Theano + symbolic expression graph. + + """ + if dtypes is None: + dtypes = {} + if broadcastables is None: + broadcastables = {} + + return self._print(expr, dtypes=dtypes, broadcastables=broadcastables) + + +global_cache: dict[Any, Any] = {} + + +def theano_code(expr, cache=None, **kwargs): + """ + Convert a SymPy expression into a Theano graph variable. + + .. deprecated:: 1.8 + + ``sympy.printing.theanocode`` is deprecated. Theano has been renamed to + Aesara. Use ``sympy.printing.aesaracode`` instead. See + :ref:`theanocode-deprecated` for more information. + + Parameters + ========== + + expr : sympy.core.expr.Expr + SymPy expression object to convert. + + cache : dict + Cached Theano variables (see :class:`TheanoPrinter.cache + `). Defaults to the module-level global cache. + + dtypes : dict + Passed to :meth:`.TheanoPrinter.doprint`. + + broadcastables : dict + Passed to :meth:`.TheanoPrinter.doprint`. + + Returns + ======= + + theano.gof.graph.Variable + A variable corresponding to the expression's value in a Theano symbolic + expression graph. + + """ + sympy_deprecation_warning( + """ + sympy.printing.theanocode is deprecated. Theano has been renamed to + Aesara. Use sympy.printing.aesaracode instead.""", + deprecated_since_version="1.8", + active_deprecations_target='theanocode-deprecated') + + if not theano: + raise ImportError("theano is required for theano_code") + + if cache is None: + cache = global_cache + + return TheanoPrinter(cache=cache, settings={}).doprint(expr, **kwargs) + + +def dim_handling(inputs, dim=None, dims=None, broadcastables=None): + r""" + Get value of ``broadcastables`` argument to :func:`.theano_code` from + keyword arguments to :func:`.theano_function`. + + Included for backwards compatibility. + + Parameters + ========== + + inputs + Sequence of input symbols. + + dim : int + Common number of dimensions for all inputs. Overrides other arguments + if given. + + dims : dict + Mapping from input symbols to number of dimensions. Overrides + ``broadcastables`` argument if given. + + broadcastables : dict + Explicit value of ``broadcastables`` argument to + :meth:`.TheanoPrinter.doprint`. If not None function will return this value unchanged. + + Returns + ======= + dict + Dictionary mapping elements of ``inputs`` to their "broadcastable" + values (tuple of ``bool``\ s). + """ + if dim is not None: + return dict.fromkeys(inputs, (False,) * dim) + + if dims is not None: + maxdim = max(dims.values()) + return { + s: (False,) * d + (True,) * (maxdim - d) + for s, d in dims.items() + } + + if broadcastables is not None: + return broadcastables + + return {} + + +@doctest_depends_on(modules=('theano',)) +def theano_function(inputs, outputs, scalar=False, *, + dim=None, dims=None, broadcastables=None, **kwargs): + """ + Create a Theano function from SymPy expressions. + + .. deprecated:: 1.8 + + ``sympy.printing.theanocode`` is deprecated. Theano has been renamed to + Aesara. Use ``sympy.printing.aesaracode`` instead. See + :ref:`theanocode-deprecated` for more information. + + The inputs and outputs are converted to Theano variables using + :func:`.theano_code` and then passed to ``theano.function``. + + Parameters + ========== + + inputs + Sequence of symbols which constitute the inputs of the function. + + outputs + Sequence of expressions which constitute the outputs(s) of the + function. The free symbols of each expression must be a subset of + ``inputs``. + + scalar : bool + Convert 0-dimensional arrays in output to scalars. This will return a + Python wrapper function around the Theano function object. + + cache : dict + Cached Theano variables (see :class:`TheanoPrinter.cache + `). Defaults to the module-level global cache. + + dtypes : dict + Passed to :meth:`.TheanoPrinter.doprint`. + + broadcastables : dict + Passed to :meth:`.TheanoPrinter.doprint`. + + dims : dict + Alternative to ``broadcastables`` argument. Mapping from elements of + ``inputs`` to integers indicating the dimension of their associated + arrays/tensors. Overrides ``broadcastables`` argument if given. + + dim : int + Another alternative to the ``broadcastables`` argument. Common number of + dimensions to use for all arrays/tensors. + ``theano_function([x, y], [...], dim=2)`` is equivalent to using + ``broadcastables={x: (False, False), y: (False, False)}``. + + Returns + ======= + callable + A callable object which takes values of ``inputs`` as positional + arguments and returns an output array for each of the expressions + in ``outputs``. If ``outputs`` is a single expression the function will + return a Numpy array, if it is a list of multiple expressions the + function will return a list of arrays. See description of the ``squeeze`` + argument above for the behavior when a single output is passed in a list. + The returned object will either be an instance of + ``theano.compile.function_module.Function`` or a Python wrapper + function around one. In both cases, the returned value will have a + ``theano_function`` attribute which points to the return value of + ``theano.function``. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.printing.theanocode import theano_function + + A simple function with one input and one output: + + >>> f1 = theano_function([x], [x**2 - 1], scalar=True) + >>> f1(3) + 8.0 + + A function with multiple inputs and one output: + + >>> f2 = theano_function([x, y, z], [(x**z + y**z)**(1/z)], scalar=True) + >>> f2(3, 4, 2) + 5.0 + + A function with multiple inputs and multiple outputs: + + >>> f3 = theano_function([x, y], [x**2 + y**2, x**2 - y**2], scalar=True) + >>> f3(2, 3) + [13.0, -5.0] + + See also + ======== + + dim_handling + + """ + sympy_deprecation_warning( + """ + sympy.printing.theanocode is deprecated. Theano has been renamed to Aesara. Use sympy.printing.aesaracode instead""", + deprecated_since_version="1.8", + active_deprecations_target='theanocode-deprecated') + + if not theano: + raise ImportError("theano is required for theano_function") + + # Pop off non-theano keyword args + cache = kwargs.pop('cache', {}) + dtypes = kwargs.pop('dtypes', {}) + + broadcastables = dim_handling( + inputs, dim=dim, dims=dims, broadcastables=broadcastables, + ) + + # Print inputs/outputs + code = partial(theano_code, cache=cache, dtypes=dtypes, + broadcastables=broadcastables) + tinputs = list(map(code, inputs)) + toutputs = list(map(code, outputs)) + + #fix constant expressions as variables + toutputs = [output if isinstance(output, theano.Variable) else tt.as_tensor_variable(output) for output in toutputs] + + if len(toutputs) == 1: + toutputs = toutputs[0] + + # Compile theano func + func = theano.function(tinputs, toutputs, **kwargs) + + is_0d = [len(o.variable.broadcastable) == 0 for o in func.outputs] + + # No wrapper required + if not scalar or not any(is_0d): + func.theano_function = func + return func + + # Create wrapper to convert 0-dimensional outputs to scalars + def wrapper(*args): + out = func(*args) + # out can be array(1.0) or [array(1.0), array(2.0)] + + if is_sequence(out): + return [o[()] if is_0d[i] else o for i, o in enumerate(out)] + else: + return out[()] + + wrapper.__wrapped__ = func + wrapper.__doc__ = func.__doc__ + wrapper.theano_function = func + return wrapper diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tree.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tree.py new file mode 100644 index 0000000000000000000000000000000000000000..82dac013419fbe93f63dcf5b90b3a529d72a32bc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/printing/tree.py @@ -0,0 +1,175 @@ +def pprint_nodes(subtrees): + """ + Prettyprints systems of nodes. + + Examples + ======== + + >>> from sympy.printing.tree import pprint_nodes + >>> print(pprint_nodes(["a", "b1\\nb2", "c"])) + +-a + +-b1 + | b2 + +-c + + """ + def indent(s, type=1): + x = s.split("\n") + r = "+-%s\n" % x[0] + for a in x[1:]: + if a == "": + continue + if type == 1: + r += "| %s\n" % a + else: + r += " %s\n" % a + return r + if not subtrees: + return "" + f = "" + for a in subtrees[:-1]: + f += indent(a) + f += indent(subtrees[-1], 2) + return f + + +def print_node(node, assumptions=True): + """ + Returns information about the "node". + + This includes class name, string representation and assumptions. + + Parameters + ========== + + assumptions : bool, optional + See the ``assumptions`` keyword in ``tree`` + """ + s = "%s: %s\n" % (node.__class__.__name__, str(node)) + + if assumptions: + d = node._assumptions + else: + d = None + + if d: + for a in sorted(d): + v = d[a] + if v is None: + continue + s += "%s: %s\n" % (a, v) + + return s + + +def tree(node, assumptions=True): + """ + Returns a tree representation of "node" as a string. + + It uses print_node() together with pprint_nodes() on node.args recursively. + + Parameters + ========== + + assumptions : bool, optional + The flag to decide whether to print out all the assumption data + (such as ``is_integer`, ``is_real``) associated with the + expression or not. + + Enabling the flag makes the result verbose, and the printed + result may not be deterministic because of the randomness used + in backtracing the assumptions. + + See Also + ======== + + print_tree + + """ + subtrees = [] + for arg in node.args: + subtrees.append(tree(arg, assumptions=assumptions)) + s = print_node(node, assumptions=assumptions) + pprint_nodes(subtrees) + return s + + +def print_tree(node, assumptions=True): + """ + Prints a tree representation of "node". + + Parameters + ========== + + assumptions : bool, optional + The flag to decide whether to print out all the assumption data + (such as ``is_integer`, ``is_real``) associated with the + expression or not. + + Enabling the flag makes the result verbose, and the printed + result may not be deterministic because of the randomness used + in backtracing the assumptions. + + Examples + ======== + + >>> from sympy.printing import print_tree + >>> from sympy import Symbol + >>> x = Symbol('x', odd=True) + >>> y = Symbol('y', even=True) + + Printing with full assumptions information: + + >>> print_tree(y**x) + Pow: y**x + +-Symbol: y + | algebraic: True + | commutative: True + | complex: True + | even: True + | extended_real: True + | finite: True + | hermitian: True + | imaginary: False + | infinite: False + | integer: True + | irrational: False + | noninteger: False + | odd: False + | rational: True + | real: True + | transcendental: False + +-Symbol: x + algebraic: True + commutative: True + complex: True + even: False + extended_nonzero: True + extended_real: True + finite: True + hermitian: True + imaginary: False + infinite: False + integer: True + irrational: False + noninteger: False + nonzero: True + odd: True + rational: True + real: True + transcendental: False + zero: False + + Hiding the assumptions: + + >>> print_tree(y**x, assumptions=False) + Pow: y**x + +-Symbol: y + +-Symbol: x + + See Also + ======== + + tree + + """ + print(tree(node, assumptions=assumptions)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..0619d1c3ebbd6c6a7d663093c7ed2202114148af --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/__init__.py @@ -0,0 +1,60 @@ +"""The module helps converting SymPy expressions into shorter forms of them. + +for example: +the expression E**(pi*I) will be converted into -1 +the expression (x+x)**2 will be converted into 4*x**2 +""" +from .simplify import (simplify, hypersimp, hypersimilar, + logcombine, separatevars, posify, besselsimp, kroneckersimp, + signsimp, nsimplify) + +from .fu import FU, fu + +from .sqrtdenest import sqrtdenest + +from .cse_main import cse + +from .epathtools import epath, EPath + +from .hyperexpand import hyperexpand + +from .radsimp import collect, rcollect, radsimp, collect_const, fraction, numer, denom + +from .trigsimp import trigsimp, exptrigsimp + +from .powsimp import powsimp, powdenest + +from .combsimp import combsimp + +from .gammasimp import gammasimp + +from .ratsimp import ratsimp, ratsimpmodprime + +__all__ = [ + 'simplify', 'hypersimp', 'hypersimilar', 'logcombine', 'separatevars', + 'posify', 'besselsimp', 'kroneckersimp', 'signsimp', + 'nsimplify', + + 'FU', 'fu', + + 'sqrtdenest', + + 'cse', + + 'epath', 'EPath', + + 'hyperexpand', + + 'collect', 'rcollect', 'radsimp', 'collect_const', 'fraction', 'numer', + 'denom', + + 'trigsimp', 'exptrigsimp', + + 'powsimp', 'powdenest', + + 'combsimp', + + 'gammasimp', + + 'ratsimp', 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a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/_cse_diff.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/_cse_diff.py new file mode 100644 index 0000000000000000000000000000000000000000..3496ad3b31a4f45312cac002429be40aa9aa0868 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/_cse_diff.py @@ -0,0 +1,291 @@ +"""Module for differentiation using CSE.""" + +from sympy import cse, Matrix, Derivative, MatrixBase +from sympy.utilities.iterables import iterable + + +def _remove_cse_from_derivative(replacements, reduced_expressions): + """ + This function is designed to postprocess the output of a common subexpression + elimination (CSE) operation. Specifically, it removes any CSE replacement + symbols from the arguments of ``Derivative`` terms in the expression. This + is necessary to ensure that the forward Jacobian function correctly handles + derivative terms. + + Parameters + ========== + + replacements : list of (Symbol, expression) pairs + Replacement symbols and relative common subexpressions that have been + replaced during a CSE operation. + + reduced_expressions : list of SymPy expressions + The reduced expressions with all the replacements from the + replacements list above. + + Returns + ======= + + processed_replacements : list of (Symbol, expression) pairs + Processed replacement list, in the same format of the + ``replacements`` input list. + + processed_reduced : list of SymPy expressions + Processed reduced list, in the same format of the + ``reduced_expressions`` input list. + """ + + def traverse(node, repl_dict): + if isinstance(node, Derivative): + return replace_all(node, repl_dict) + if not node.args: + return node + new_args = [traverse(arg, repl_dict) for arg in node.args] + return node.func(*new_args) + + def replace_all(node, repl_dict): + result = node + while True: + free_symbols = result.free_symbols + symbols_dict = {k: repl_dict[k] for k in free_symbols if k in repl_dict} + if not symbols_dict: + break + result = result.xreplace(symbols_dict) + return result + + repl_dict = dict(replacements) + processed_replacements = [ + (rep_sym, traverse(sub_exp, repl_dict)) + for rep_sym, sub_exp in replacements + ] + processed_reduced = [ + red_exp.__class__([traverse(exp, repl_dict) for exp in red_exp]) + for red_exp in reduced_expressions + ] + + return processed_replacements, processed_reduced + + +def _forward_jacobian_cse(replacements, reduced_expr, wrt): + """ + Core function to compute the Jacobian of an input Matrix of expressions + through forward accumulation. Takes directly the output of a CSE operation + (replacements and reduced_expr), and an iterable of variables (wrt) with + respect to which to differentiate the reduced expression and returns the + reduced Jacobian matrix and the ``replacements`` list. + + The function also returns a list of precomputed free symbols for each + subexpression, which are useful in the substitution process. + + Parameters + ========== + + replacements : list of (Symbol, expression) pairs + Replacement symbols and relative common subexpressions that have been + replaced during a CSE operation. + + reduced_expr : list of SymPy expressions + The reduced expressions with all the replacements from the + replacements list above. + + wrt : iterable + Iterable of expressions with respect to which to compute the + Jacobian matrix. + + Returns + ======= + + replacements : list of (Symbol, expression) pairs + Replacement symbols and relative common subexpressions that have been + replaced during a CSE operation. Compared to the input replacement list, + the output one doesn't contain replacement symbols inside + ``Derivative``'s arguments. + + jacobian : list of SymPy expressions + The list only contains one element, which is the Jacobian matrix with + elements in reduced form (replacement symbols are present). + + precomputed_fs: list + List of sets, which store the free symbols present in each sub-expression. + Useful in the substitution process. + """ + + if not isinstance(reduced_expr[0], MatrixBase): + raise TypeError("``expr`` must be of matrix type") + + if not (reduced_expr[0].shape[0] == 1 or reduced_expr[0].shape[1] == 1): + raise TypeError("``expr`` must be a row or a column matrix") + + if not iterable(wrt): + raise TypeError("``wrt`` must be an iterable of variables") + + elif not isinstance(wrt, MatrixBase): + wrt = Matrix(wrt) + + if not (wrt.shape[0] == 1 or wrt.shape[1] == 1): + raise TypeError("``wrt`` must be a row or a column matrix") + + replacements, reduced_expr = _remove_cse_from_derivative(replacements, reduced_expr) + + if replacements: + rep_sym, sub_expr = map(Matrix, zip(*replacements)) + else: + rep_sym, sub_expr = Matrix([]), Matrix([]) + + l_sub, l_wrt, l_red = len(sub_expr), len(wrt), len(reduced_expr[0]) + + f1 = reduced_expr[0].__class__.from_dok(l_red, l_wrt, + { + (i, j): diff_value + for i, r in enumerate(reduced_expr[0]) + for j, w in enumerate(wrt) + if (diff_value := r.diff(w)) != 0 + }, + ) + + if not replacements: + return [], [f1], [] + + f2 = Matrix.from_dok(l_red, l_sub, + { + (i, j): diff_value + for i, (r, fs) in enumerate([(r, r.free_symbols) for r in reduced_expr[0]]) + for j, s in enumerate(rep_sym) + if s in fs and (diff_value := r.diff(s)) != 0 + }, + ) + + rep_sym_set = set(rep_sym) + precomputed_fs = [s.free_symbols & rep_sym_set for s in sub_expr ] + + c_matrix = Matrix.from_dok(1, l_wrt, + {(0, j): diff_value for j, w in enumerate(wrt) + if (diff_value := sub_expr[0].diff(w)) != 0}) + + for i in range(1, l_sub): + + bi_matrix = Matrix.from_dok(1, i, + {(0, j): diff_value for j in range(i + 1) + if rep_sym[j] in precomputed_fs[i] + and (diff_value := sub_expr[i].diff(rep_sym[j])) != 0}) + + ai_matrix = Matrix.from_dok(1, l_wrt, + {(0, j): diff_value for j, w in enumerate(wrt) + if (diff_value := sub_expr[i].diff(w)) != 0}) + + if bi_matrix._rep.nnz(): + ci_matrix = bi_matrix.multiply(c_matrix).add(ai_matrix) + c_matrix = Matrix.vstack(c_matrix, ci_matrix) + else: + c_matrix = Matrix.vstack(c_matrix, ai_matrix) + + jacobian = f2.multiply(c_matrix).add(f1) + jacobian = [reduced_expr[0].__class__(jacobian)] + + return replacements, jacobian, precomputed_fs + + +def _forward_jacobian_norm_in_cse_out(expr, wrt): + """ + Function to compute the Jacobian of an input Matrix of expressions through + forward accumulation. Takes a sympy Matrix of expressions (expr) as input + and an iterable of variables (wrt) with respect to which to compute the + Jacobian matrix. The matrix is returned in reduced form (containing + replacement symbols) along with the ``replacements`` list. + + The function also returns a list of precomputed free symbols for each + subexpression, which are useful in the substitution process. + + Parameters + ========== + + expr : Matrix + The vector to be differentiated. + + wrt : iterable + The vector with respect to which to perform the differentiation. + Can be a matrix or an iterable of variables. + + Returns + ======= + + replacements : list of (Symbol, expression) pairs + Replacement symbols and relative common subexpressions that have been + replaced during a CSE operation. The output replacement list doesn't + contain replacement symbols inside ``Derivative``'s arguments. + + jacobian : list of SymPy expressions + The list only contains one element, which is the Jacobian matrix with + elements in reduced form (replacement symbols are present). + + precomputed_fs: list + List of sets, which store the free symbols present in each + sub-expression. Useful in the substitution process. + """ + + replacements, reduced_expr = cse(expr) + replacements, jacobian, precomputed_fs = _forward_jacobian_cse(replacements, reduced_expr, wrt) + + return replacements, jacobian, precomputed_fs + + +def _forward_jacobian(expr, wrt): + """ + Function to compute the Jacobian of an input Matrix of expressions through + forward accumulation. Takes a sympy Matrix of expressions (expr) as input + and an iterable of variables (wrt) with respect to which to compute the + Jacobian matrix. + + Explanation + =========== + + Expressions often contain repeated subexpressions. Using a tree structure, + these subexpressions are duplicated and differentiated multiple times, + leading to inefficiency. + + Instead, if a data structure called a directed acyclic graph (DAG) is used + then each of these repeated subexpressions will only exist a single time. + This function uses a combination of representing the expression as a DAG and + a forward accumulation algorithm (repeated application of the chain rule + symbolically) to more efficiently calculate the Jacobian matrix of a target + expression ``expr`` with respect to an expression or set of expressions + ``wrt``. + + Note that this function is intended to improve performance when + differentiating large expressions that contain many common subexpressions. + For small and simple expressions it is likely less performant than using + SymPy's standard differentiation functions and methods. + + Parameters + ========== + + expr : Matrix + The vector to be differentiated. + + wrt : iterable + The vector with respect to which to do the differentiation. + Can be a matrix or an iterable of variables. + + See Also + ======== + + Direct Acyclic Graph : https://en.wikipedia.org/wiki/Directed_acyclic_graph + """ + + replacements, reduced_expr = cse(expr) + + if replacements: + rep_sym, _ = map(Matrix, zip(*replacements)) + else: + rep_sym = Matrix([]) + + replacements, jacobian, precomputed_fs = _forward_jacobian_cse(replacements, reduced_expr, wrt) + + if not replacements: return jacobian[0] + + sub_rep = dict(replacements) + for i, ik in enumerate(precomputed_fs): + sub_dict = {j: sub_rep[j] for j in ik} + sub_rep[rep_sym[i]] = sub_rep[rep_sym[i]].xreplace(sub_dict) + + return jacobian[0].xreplace(sub_rep) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/combsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/combsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..8b0b3cefcba11b4b7759b7d3ec3c2d4415cfd849 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/combsimp.py @@ -0,0 +1,114 @@ +from sympy.core import Mul +from sympy.core.function import count_ops +from sympy.core.traversal import preorder_traversal, bottom_up +from sympy.functions.combinatorial.factorials import binomial, factorial +from sympy.functions import gamma +from sympy.simplify.gammasimp import gammasimp, _gammasimp + +from sympy.utilities.timeutils import timethis + + +@timethis('combsimp') +def combsimp(expr): + r""" + Simplify combinatorial expressions. + + Explanation + =========== + + This function takes as input an expression containing factorials, + binomials, Pochhammer symbol and other "combinatorial" functions, + and tries to minimize the number of those functions and reduce + the size of their arguments. + + The algorithm works by rewriting all combinatorial functions as + gamma functions and applying gammasimp() except simplification + steps that may make an integer argument non-integer. See docstring + of gammasimp for more information. + + Then it rewrites expression in terms of factorials and binomials by + rewriting gammas as factorials and converting (a+b)!/a!b! into + binomials. + + If expression has gamma functions or combinatorial functions + with non-integer argument, it is automatically passed to gammasimp. + + Examples + ======== + + >>> from sympy.simplify import combsimp + >>> from sympy import factorial, binomial, symbols + >>> n, k = symbols('n k', integer = True) + + >>> combsimp(factorial(n)/factorial(n - 3)) + n*(n - 2)*(n - 1) + >>> combsimp(binomial(n+1, k+1)/binomial(n, k)) + (n + 1)/(k + 1) + + """ + + expr = expr.rewrite(gamma, piecewise=False) + if any(isinstance(node, gamma) and not node.args[0].is_integer + for node in preorder_traversal(expr)): + return gammasimp(expr) + + expr = _gammasimp(expr, as_comb = True) + expr = _gamma_as_comb(expr) + return expr + + +def _gamma_as_comb(expr): + """ + Helper function for combsimp. + + Rewrites expression in terms of factorials and binomials + """ + + expr = expr.rewrite(factorial) + + def f(rv): + if not rv.is_Mul: + return rv + rvd = rv.as_powers_dict() + nd_fact_args = [[], []] # numerator, denominator + + for k in rvd: + if isinstance(k, factorial) and rvd[k].is_Integer: + if rvd[k].is_positive: + nd_fact_args[0].extend([k.args[0]]*rvd[k]) + else: + nd_fact_args[1].extend([k.args[0]]*-rvd[k]) + rvd[k] = 0 + if not nd_fact_args[0] or not nd_fact_args[1]: + return rv + + hit = False + for m in range(2): + i = 0 + while i < len(nd_fact_args[m]): + ai = nd_fact_args[m][i] + for j in range(i + 1, len(nd_fact_args[m])): + aj = nd_fact_args[m][j] + + sum = ai + aj + if sum in nd_fact_args[1 - m]: + hit = True + + nd_fact_args[1 - m].remove(sum) + del nd_fact_args[m][j] + del nd_fact_args[m][i] + + rvd[binomial(sum, ai if count_ops(ai) < + count_ops(aj) else aj)] += ( + -1 if m == 0 else 1) + break + else: + i += 1 + + if hit: + return Mul(*([k**rvd[k] for k in rvd] + [factorial(k) + for k in nd_fact_args[0]]))/Mul(*[factorial(k) + for k in nd_fact_args[1]]) + return rv + + return bottom_up(expr, f) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_main.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_main.py new file mode 100644 index 0000000000000000000000000000000000000000..bcd1b2e50adae8c3d3400d6c489e63a44ae1e59b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_main.py @@ -0,0 +1,945 @@ +""" Tools for doing common subexpression elimination. +""" +from collections import defaultdict + +from sympy.core import Basic, Mul, Add, Pow, sympify +from sympy.core.containers import Tuple, OrderedSet +from sympy.core.exprtools import factor_terms +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import symbols, Symbol +from sympy.matrices import (MatrixBase, Matrix, ImmutableMatrix, + SparseMatrix, ImmutableSparseMatrix) +from sympy.matrices.expressions import (MatrixExpr, MatrixSymbol, MatMul, + MatAdd, MatPow, Inverse) +from sympy.matrices.expressions.matexpr import MatrixElement +from sympy.polys.rootoftools import RootOf +from sympy.utilities.iterables import numbered_symbols, sift, \ + topological_sort, iterable + +from . import cse_opts + +# (preprocessor, postprocessor) pairs which are commonly useful. They should +# each take a SymPy expression and return a possibly transformed expression. +# When used in the function ``cse()``, the target expressions will be transformed +# by each of the preprocessor functions in order. After the common +# subexpressions are eliminated, each resulting expression will have the +# postprocessor functions transform them in *reverse* order in order to undo the +# transformation if necessary. This allows the algorithm to operate on +# a representation of the expressions that allows for more optimization +# opportunities. +# ``None`` can be used to specify no transformation for either the preprocessor or +# postprocessor. + + +basic_optimizations = [(cse_opts.sub_pre, cse_opts.sub_post), + (factor_terms, None)] + +# sometimes we want the output in a different format; non-trivial +# transformations can be put here for users +# =============================================================== + + +def reps_toposort(r): + """Sort replacements ``r`` so (k1, v1) appears before (k2, v2) + if k2 is in v1's free symbols. This orders items in the + way that cse returns its results (hence, in order to use the + replacements in a substitution option it would make sense + to reverse the order). + + Examples + ======== + + >>> from sympy.simplify.cse_main import reps_toposort + >>> from sympy.abc import x, y + >>> from sympy import Eq + >>> for l, r in reps_toposort([(x, y + 1), (y, 2)]): + ... print(Eq(l, r)) + ... + Eq(y, 2) + Eq(x, y + 1) + + """ + r = sympify(r) + E = [] + for c1, (k1, v1) in enumerate(r): + for c2, (k2, v2) in enumerate(r): + if k1 in v2.free_symbols: + E.append((c1, c2)) + return [r[i] for i in topological_sort((range(len(r)), E))] + + +def cse_separate(r, e): + """Move expressions that are in the form (symbol, expr) out of the + expressions and sort them into the replacements using the reps_toposort. + + Examples + ======== + + >>> from sympy.simplify.cse_main import cse_separate + >>> from sympy.abc import x, y, z + >>> from sympy import cos, exp, cse, Eq, symbols + >>> x0, x1 = symbols('x:2') + >>> eq = (x + 1 + exp((x + 1)/(y + 1)) + cos(y + 1)) + >>> cse([eq, Eq(x, z + 1), z - 2], postprocess=cse_separate) in [ + ... [[(x0, y + 1), (x, z + 1), (x1, x + 1)], + ... [x1 + exp(x1/x0) + cos(x0), z - 2]], + ... [[(x1, y + 1), (x, z + 1), (x0, x + 1)], + ... [x0 + exp(x0/x1) + cos(x1), z - 2]]] + ... + True + """ + d = sift(e, lambda w: w.is_Equality and w.lhs.is_Symbol) + r = r + [w.args for w in d[True]] + e = d[False] + return [reps_toposort(r), e] + + +def cse_release_variables(r, e): + """ + Return tuples giving ``(a, b)`` where ``a`` is a symbol and ``b`` is + either an expression or None. The value of None is used when a + symbol is no longer needed for subsequent expressions. + + Use of such output can reduce the memory footprint of lambdified + expressions that contain large, repeated subexpressions. + + Examples + ======== + + >>> from sympy import cse + >>> from sympy.simplify.cse_main import cse_release_variables + >>> from sympy.abc import x, y + >>> eqs = [(x + y - 1)**2, x, x + y, (x + y)/(2*x + 1) + (x + y - 1)**2, (2*x + 1)**(x + y)] + >>> defs, rvs = cse_release_variables(*cse(eqs)) + >>> for i in defs: + ... print(i) + ... + (x0, x + y) + (x1, (x0 - 1)**2) + (x2, 2*x + 1) + (_3, x0/x2 + x1) + (_4, x2**x0) + (x2, None) + (_0, x1) + (x1, None) + (_2, x0) + (x0, None) + (_1, x) + >>> print(rvs) + (_0, _1, _2, _3, _4) + """ + if not r: + return r, e + + s, p = zip(*r) + esyms = symbols('_:%d' % len(e)) + syms = list(esyms) + s = list(s) + in_use = set(s) + p = list(p) + # sort e so those with most sub-expressions appear first + e = [(e[i], syms[i]) for i in range(len(e))] + e, syms = zip(*sorted(e, + key=lambda x: -sum(p[s.index(i)].count_ops() + for i in x[0].free_symbols & in_use))) + syms = list(syms) + p += e + rv = [] + i = len(p) - 1 + while i >= 0: + _p = p.pop() + c = in_use & _p.free_symbols + if c: # sorting for canonical results + rv.extend([(s, None) for s in sorted(c, key=str)]) + if i >= len(r): + rv.append((syms.pop(), _p)) + else: + rv.append((s[i], _p)) + in_use -= c + i -= 1 + rv.reverse() + return rv, esyms + + +# ====end of cse postprocess idioms=========================== + + +def preprocess_for_cse(expr, optimizations): + """ Preprocess an expression to optimize for common subexpression + elimination. + + Parameters + ========== + + expr : SymPy expression + The target expression to optimize. + optimizations : list of (callable, callable) pairs + The (preprocessor, postprocessor) pairs. + + Returns + ======= + + expr : SymPy expression + The transformed expression. + """ + for pre, post in optimizations: + if pre is not None: + expr = pre(expr) + return expr + + +def postprocess_for_cse(expr, optimizations): + """Postprocess an expression after common subexpression elimination to + return the expression to canonical SymPy form. + + Parameters + ========== + + expr : SymPy expression + The target expression to transform. + optimizations : list of (callable, callable) pairs, optional + The (preprocessor, postprocessor) pairs. The postprocessors will be + applied in reversed order to undo the effects of the preprocessors + correctly. + + Returns + ======= + + expr : SymPy expression + The transformed expression. + """ + for pre, post in reversed(optimizations): + if post is not None: + expr = post(expr) + return expr + + +class FuncArgTracker: + """ + A class which manages a mapping from functions to arguments and an inverse + mapping from arguments to functions. + """ + + def __init__(self, funcs): + # To minimize the number of symbolic comparisons, all function arguments + # get assigned a value number. + self.value_numbers = {} + self.value_number_to_value = [] + + # Both of these maps use integer indices for arguments / functions. + self.arg_to_funcset = [] + self.func_to_argset = [] + + for func_i, func in enumerate(funcs): + func_argset = OrderedSet() + + for func_arg in func.args: + arg_number = self.get_or_add_value_number(func_arg) + func_argset.add(arg_number) + self.arg_to_funcset[arg_number].add(func_i) + + self.func_to_argset.append(func_argset) + + def get_args_in_value_order(self, argset): + """ + Return the list of arguments in sorted order according to their value + numbers. + """ + return [self.value_number_to_value[argn] for argn in sorted(argset)] + + def get_or_add_value_number(self, value): + """ + Return the value number for the given argument. + """ + nvalues = len(self.value_numbers) + value_number = self.value_numbers.setdefault(value, nvalues) + if value_number == nvalues: + self.value_number_to_value.append(value) + self.arg_to_funcset.append(OrderedSet()) + return value_number + + def stop_arg_tracking(self, func_i): + """ + Remove the function func_i from the argument to function mapping. + """ + for arg in self.func_to_argset[func_i]: + self.arg_to_funcset[arg].remove(func_i) + + + def get_common_arg_candidates(self, argset, min_func_i=0): + """Return a dict whose keys are function numbers. The entries of the dict are + the number of arguments said function has in common with + ``argset``. Entries have at least 2 items in common. All keys have + value at least ``min_func_i``. + """ + count_map = defaultdict(lambda: 0) + if not argset: + return count_map + + funcsets = [self.arg_to_funcset[arg] for arg in argset] + # As an optimization below, we handle the largest funcset separately from + # the others. + largest_funcset = max(funcsets, key=len) + + for funcset in funcsets: + if largest_funcset is funcset: + continue + for func_i in funcset: + if func_i >= min_func_i: + count_map[func_i] += 1 + + # We pick the smaller of the two containers (count_map, largest_funcset) + # to iterate over to reduce the number of iterations needed. + (smaller_funcs_container, + larger_funcs_container) = sorted( + [largest_funcset, count_map], + key=len) + + for func_i in smaller_funcs_container: + # Not already in count_map? It can't possibly be in the output, so + # skip it. + if count_map[func_i] < 1: + continue + + if func_i in larger_funcs_container: + count_map[func_i] += 1 + + return {k: v for k, v in count_map.items() if v >= 2} + + def get_subset_candidates(self, argset, restrict_to_funcset=None): + """ + Return a set of functions each of which whose argument list contains + ``argset``, optionally filtered only to contain functions in + ``restrict_to_funcset``. + """ + iarg = iter(argset) + + indices = OrderedSet( + fi for fi in self.arg_to_funcset[next(iarg)]) + + if restrict_to_funcset is not None: + indices &= restrict_to_funcset + + for arg in iarg: + indices &= self.arg_to_funcset[arg] + + return indices + + def update_func_argset(self, func_i, new_argset): + """ + Update a function with a new set of arguments. + """ + new_args = OrderedSet(new_argset) + old_args = self.func_to_argset[func_i] + + for deleted_arg in old_args - new_args: + self.arg_to_funcset[deleted_arg].remove(func_i) + for added_arg in new_args - old_args: + self.arg_to_funcset[added_arg].add(func_i) + + self.func_to_argset[func_i].clear() + self.func_to_argset[func_i].update(new_args) + + +class Unevaluated: + + def __init__(self, func, args): + self.func = func + self.args = args + + def __str__(self): + return "Uneval<{}>({})".format( + self.func, ", ".join(str(a) for a in self.args)) + + def as_unevaluated_basic(self): + return self.func(*self.args, evaluate=False) + + @property + def free_symbols(self): + return set().union(*[a.free_symbols for a in self.args]) + + __repr__ = __str__ + + +def match_common_args(func_class, funcs, opt_subs): + """ + Recognize and extract common subexpressions of function arguments within a + set of function calls. For instance, for the following function calls:: + + x + z + y + sin(x + y) + + this will extract a common subexpression of `x + y`:: + + w = x + y + w + z + sin(w) + + The function we work with is assumed to be associative and commutative. + + Parameters + ========== + + func_class: class + The function class (e.g. Add, Mul) + funcs: list of functions + A list of function calls. + opt_subs: dict + A dictionary of substitutions which this function may update. + """ + + # Sort to ensure that whole-function subexpressions come before the items + # that use them. + funcs = sorted(funcs, key=lambda f: len(f.args)) + arg_tracker = FuncArgTracker(funcs) + + changed = OrderedSet() + + for i in range(len(funcs)): + common_arg_candidates_counts = arg_tracker.get_common_arg_candidates( + arg_tracker.func_to_argset[i], min_func_i=i + 1) + + # Sort the candidates in order of match size. + # This makes us try combining smaller matches first. + common_arg_candidates = OrderedSet(sorted( + common_arg_candidates_counts.keys(), + key=lambda k: (common_arg_candidates_counts[k], k))) + + while common_arg_candidates: + j = common_arg_candidates.pop(last=False) + + com_args = arg_tracker.func_to_argset[i].intersection( + arg_tracker.func_to_argset[j]) + + if len(com_args) <= 1: + # This may happen if a set of common arguments was already + # combined in a previous iteration. + continue + + # For all sets, replace the common symbols by the function + # over them, to allow recursive matches. + + diff_i = arg_tracker.func_to_argset[i].difference(com_args) + if diff_i: + # com_func needs to be unevaluated to allow for recursive matches. + com_func = Unevaluated( + func_class, arg_tracker.get_args_in_value_order(com_args)) + com_func_number = arg_tracker.get_or_add_value_number(com_func) + arg_tracker.update_func_argset(i, diff_i | OrderedSet([com_func_number])) + changed.add(i) + else: + # Treat the whole expression as a CSE. + # + # The reason this needs to be done is somewhat subtle. Within + # tree_cse(), to_eliminate only contains expressions that are + # seen more than once. The problem is unevaluated expressions + # do not compare equal to the evaluated equivalent. So + # tree_cse() won't mark funcs[i] as a CSE if we use an + # unevaluated version. + com_func_number = arg_tracker.get_or_add_value_number(funcs[i]) + + diff_j = arg_tracker.func_to_argset[j].difference(com_args) + arg_tracker.update_func_argset(j, diff_j | OrderedSet([com_func_number])) + changed.add(j) + + for k in arg_tracker.get_subset_candidates( + com_args, common_arg_candidates): + diff_k = arg_tracker.func_to_argset[k].difference(com_args) + arg_tracker.update_func_argset(k, diff_k | OrderedSet([com_func_number])) + changed.add(k) + + if i in changed: + opt_subs[funcs[i]] = Unevaluated(func_class, + arg_tracker.get_args_in_value_order(arg_tracker.func_to_argset[i])) + + arg_tracker.stop_arg_tracking(i) + + +def opt_cse(exprs, order='canonical'): + """Find optimization opportunities in Adds, Muls, Pows and negative + coefficient Muls. + + Parameters + ========== + + exprs : list of SymPy expressions + The expressions to optimize. + order : string, 'none' or 'canonical' + The order by which Mul and Add arguments are processed. For large + expressions where speed is a concern, use the setting order='none'. + + Returns + ======= + + opt_subs : dictionary of expression substitutions + The expression substitutions which can be useful to optimize CSE. + + Examples + ======== + + >>> from sympy.simplify.cse_main import opt_cse + >>> from sympy.abc import x + >>> opt_subs = opt_cse([x**-2]) + >>> k, v = list(opt_subs.keys())[0], list(opt_subs.values())[0] + >>> print((k, v.as_unevaluated_basic())) + (x**(-2), 1/(x**2)) + """ + opt_subs = {} + + adds = OrderedSet() + muls = OrderedSet() + + seen_subexp = set() + collapsible_subexp = set() + + def _find_opts(expr): + + if not isinstance(expr, (Basic, Unevaluated)): + return + + if expr.is_Atom or expr.is_Order: + return + + if iterable(expr): + list(map(_find_opts, expr)) + return + + if expr in seen_subexp: + return expr + seen_subexp.add(expr) + + list(map(_find_opts, expr.args)) + + if not isinstance(expr, MatrixExpr) and expr.could_extract_minus_sign(): + # XXX -expr does not always work rigorously for some expressions + # containing UnevaluatedExpr. + # https://github.com/sympy/sympy/issues/24818 + if isinstance(expr, Add): + neg_expr = Add(*(-i for i in expr.args)) + else: + neg_expr = -expr + + if not neg_expr.is_Atom: + opt_subs[expr] = Unevaluated(Mul, (S.NegativeOne, neg_expr)) + seen_subexp.add(neg_expr) + expr = neg_expr + + if isinstance(expr, (Mul, MatMul)): + if len(expr.args) == 1: + collapsible_subexp.add(expr) + else: + muls.add(expr) + + elif isinstance(expr, (Add, MatAdd)): + if len(expr.args) == 1: + collapsible_subexp.add(expr) + else: + adds.add(expr) + + elif isinstance(expr, Inverse): + # Do not want to treat `Inverse` as a `MatPow` + pass + + elif isinstance(expr, (Pow, MatPow)): + base, exp = expr.base, expr.exp + if exp.could_extract_minus_sign(): + opt_subs[expr] = Unevaluated(Pow, (Pow(base, -exp), -1)) + + for e in exprs: + if isinstance(e, (Basic, Unevaluated)): + _find_opts(e) + + # Handle collapsing of multinary operations with single arguments + edges = [(s, s.args[0]) for s in collapsible_subexp + if s.args[0] in collapsible_subexp] + for e in reversed(topological_sort((collapsible_subexp, edges))): + opt_subs[e] = opt_subs.get(e.args[0], e.args[0]) + + # split muls into commutative + commutative_muls = OrderedSet() + for m in muls: + c, nc = m.args_cnc(cset=False) + if c: + c_mul = m.func(*c) + if nc: + if c_mul == 1: + new_obj = m.func(*nc) + else: + if isinstance(m, MatMul): + new_obj = m.func(c_mul, *nc, evaluate=False) + else: + new_obj = m.func(c_mul, m.func(*nc), evaluate=False) + opt_subs[m] = new_obj + if len(c) > 1: + commutative_muls.add(c_mul) + + match_common_args(Add, adds, opt_subs) + match_common_args(Mul, commutative_muls, opt_subs) + + return opt_subs + + +def tree_cse(exprs, symbols, opt_subs=None, order='canonical', ignore=()): + """Perform raw CSE on expression tree, taking opt_subs into account. + + Parameters + ========== + + exprs : list of SymPy expressions + The expressions to reduce. + symbols : infinite iterator yielding unique Symbols + The symbols used to label the common subexpressions which are pulled + out. + opt_subs : dictionary of expression substitutions + The expressions to be substituted before any CSE action is performed. + order : string, 'none' or 'canonical' + The order by which Mul and Add arguments are processed. For large + expressions where speed is a concern, use the setting order='none'. + ignore : iterable of Symbols + Substitutions containing any Symbol from ``ignore`` will be ignored. + """ + if opt_subs is None: + opt_subs = {} + + ## Find repeated sub-expressions + + to_eliminate = set() + + seen_subexp = set() + excluded_symbols = set() + + def _find_repeated(expr): + if not isinstance(expr, (Basic, Unevaluated)): + return + + if isinstance(expr, RootOf): + return + + if isinstance(expr, Basic) and ( + expr.is_Atom or + expr.is_Order or + isinstance(expr, (MatrixSymbol, MatrixElement))): + if expr.is_Symbol: + excluded_symbols.add(expr.name) + return + + if iterable(expr): + args = expr + + else: + if expr in seen_subexp: + for ign in ignore: + if ign in expr.free_symbols: + break + else: + to_eliminate.add(expr) + return + + seen_subexp.add(expr) + + if expr in opt_subs: + expr = opt_subs[expr] + + args = expr.args + + list(map(_find_repeated, args)) + + for e in exprs: + if isinstance(e, Basic): + _find_repeated(e) + + ## Rebuild tree + + # Remove symbols from the generator that conflict with names in the expressions. + symbols = (_ for _ in symbols if _.name not in excluded_symbols) + + replacements = [] + + subs = {} + + def _rebuild(expr): + if not isinstance(expr, (Basic, Unevaluated)): + return expr + + if not expr.args: + return expr + + if iterable(expr): + new_args = [_rebuild(arg) for arg in expr.args] + return expr.func(*new_args) + + if expr in subs: + return subs[expr] + + orig_expr = expr + if expr in opt_subs: + expr = opt_subs[expr] + + # If enabled, parse Muls and Adds arguments by order to ensure + # replacement order independent from hashes + if order != 'none': + if isinstance(expr, (Mul, MatMul)): + c, nc = expr.args_cnc() + if c == [1]: + args = nc + else: + args = list(ordered(c)) + nc + elif isinstance(expr, (Add, MatAdd)): + args = list(ordered(expr.args)) + else: + args = expr.args + else: + args = expr.args + + new_args = list(map(_rebuild, args)) + if isinstance(expr, Unevaluated) or new_args != args: + new_expr = expr.func(*new_args) + else: + new_expr = expr + + if orig_expr in to_eliminate: + try: + sym = next(symbols) + except StopIteration: + raise ValueError("Symbols iterator ran out of symbols.") + + if isinstance(orig_expr, MatrixExpr): + sym = MatrixSymbol(sym.name, orig_expr.rows, + orig_expr.cols) + + subs[orig_expr] = sym + replacements.append((sym, new_expr)) + return sym + + else: + return new_expr + + reduced_exprs = [] + for e in exprs: + if isinstance(e, Basic): + reduced_e = _rebuild(e) + else: + reduced_e = e + reduced_exprs.append(reduced_e) + return replacements, reduced_exprs + + +def cse(exprs, symbols=None, optimizations=None, postprocess=None, + order='canonical', ignore=(), list=True): + """ Perform common subexpression elimination on an expression. + + Parameters + ========== + + exprs : list of SymPy expressions, or a single SymPy expression + The expressions to reduce. + symbols : infinite iterator yielding unique Symbols + The symbols used to label the common subexpressions which are pulled + out. The ``numbered_symbols`` generator is useful. The default is a + stream of symbols of the form "x0", "x1", etc. This must be an + infinite iterator. + optimizations : list of (callable, callable) pairs + The (preprocessor, postprocessor) pairs of external optimization + functions. Optionally 'basic' can be passed for a set of predefined + basic optimizations. Such 'basic' optimizations were used by default + in old implementation, however they can be really slow on larger + expressions. Now, no pre or post optimizations are made by default. + postprocess : a function which accepts the two return values of cse and + returns the desired form of output from cse, e.g. if you want the + replacements reversed the function might be the following lambda: + lambda r, e: return reversed(r), e + order : string, 'none' or 'canonical' + The order by which Mul and Add arguments are processed. If set to + 'canonical', arguments will be canonically ordered. If set to 'none', + ordering will be faster but dependent on expressions hashes, thus + machine dependent and variable. For large expressions where speed is a + concern, use the setting order='none'. + ignore : iterable of Symbols + Substitutions containing any Symbol from ``ignore`` will be ignored. + list : bool, (default True) + Returns expression in list or else with same type as input (when False). + + Returns + ======= + + replacements : list of (Symbol, expression) pairs + All of the common subexpressions that were replaced. Subexpressions + earlier in this list might show up in subexpressions later in this + list. + reduced_exprs : list of SymPy expressions + The reduced expressions with all of the replacements above. + + Examples + ======== + + >>> from sympy import cse, SparseMatrix + >>> from sympy.abc import x, y, z, w + >>> cse(((w + x + y + z)*(w + y + z))/(w + x)**3) + ([(x0, y + z), (x1, w + x)], [(w + x0)*(x0 + x1)/x1**3]) + + + List of expressions with recursive substitutions: + + >>> m = SparseMatrix([x + y, x + y + z]) + >>> cse([(x+y)**2, x + y + z, y + z, x + z + y, m]) + ([(x0, x + y), (x1, x0 + z)], [x0**2, x1, y + z, x1, Matrix([ + [x0], + [x1]])]) + + Note: the type and mutability of input matrices is retained. + + >>> isinstance(_[1][-1], SparseMatrix) + True + + The user may disallow substitutions containing certain symbols: + + >>> cse([y**2*(x + 1), 3*y**2*(x + 1)], ignore=(y,)) + ([(x0, x + 1)], [x0*y**2, 3*x0*y**2]) + + The default return value for the reduced expression(s) is a list, even if there is only + one expression. The `list` flag preserves the type of the input in the output: + + >>> cse(x) + ([], [x]) + >>> cse(x, list=False) + ([], x) + """ + if not list: + return _cse_homogeneous(exprs, + symbols=symbols, optimizations=optimizations, + postprocess=postprocess, order=order, ignore=ignore) + + if isinstance(exprs, (int, float)): + exprs = sympify(exprs) + + # Handle the case if just one expression was passed. + if isinstance(exprs, (Basic, MatrixBase)): + exprs = [exprs] + + copy = exprs + temp = [] + for e in exprs: + if isinstance(e, (Matrix, ImmutableMatrix)): + temp.append(Tuple(*e.flat())) + elif isinstance(e, (SparseMatrix, ImmutableSparseMatrix)): + temp.append(Tuple(*e.todok().items())) + else: + temp.append(e) + exprs = temp + del temp + + if optimizations is None: + optimizations = [] + elif optimizations == 'basic': + optimizations = basic_optimizations + + # Preprocess the expressions to give us better optimization opportunities. + reduced_exprs = [preprocess_for_cse(e, optimizations) for e in exprs] + + if symbols is None: + symbols = numbered_symbols(cls=Symbol) + else: + # In case we get passed an iterable with an __iter__ method instead of + # an actual iterator. + symbols = iter(symbols) + + # Find other optimization opportunities. + opt_subs = opt_cse(reduced_exprs, order) + + # Main CSE algorithm. + replacements, reduced_exprs = tree_cse(reduced_exprs, symbols, opt_subs, + order, ignore) + + # Postprocess the expressions to return the expressions to canonical form. + exprs = copy + replacements = [(sym, postprocess_for_cse(subtree, optimizations)) + for sym, subtree in replacements] + reduced_exprs = [postprocess_for_cse(e, optimizations) + for e in reduced_exprs] + + # Get the matrices back + for i, e in enumerate(exprs): + if isinstance(e, (Matrix, ImmutableMatrix)): + reduced_exprs[i] = Matrix(e.rows, e.cols, reduced_exprs[i]) + if isinstance(e, ImmutableMatrix): + reduced_exprs[i] = reduced_exprs[i].as_immutable() + elif isinstance(e, (SparseMatrix, ImmutableSparseMatrix)): + m = SparseMatrix(e.rows, e.cols, {}) + for k, v in reduced_exprs[i]: + m[k] = v + if isinstance(e, ImmutableSparseMatrix): + m = m.as_immutable() + reduced_exprs[i] = m + + if postprocess is None: + return replacements, reduced_exprs + + return postprocess(replacements, reduced_exprs) + + +def _cse_homogeneous(exprs, **kwargs): + """ + Same as ``cse`` but the ``reduced_exprs`` are returned + with the same type as ``exprs`` or a sympified version of the same. + + Parameters + ========== + + exprs : an Expr, iterable of Expr or dictionary with Expr values + the expressions in which repeated subexpressions will be identified + kwargs : additional arguments for the ``cse`` function + + Returns + ======= + + replacements : list of (Symbol, expression) pairs + All of the common subexpressions that were replaced. Subexpressions + earlier in this list might show up in subexpressions later in this + list. + reduced_exprs : list of SymPy expressions + The reduced expressions with all of the replacements above. + + Examples + ======== + + >>> from sympy.simplify.cse_main import cse + >>> from sympy import cos, Tuple, Matrix + >>> from sympy.abc import x + >>> output = lambda x: type(cse(x, list=False)[1]) + >>> output(1) + + >>> output('cos(x)') + + >>> output(cos(x)) + cos + >>> output(Tuple(1, x)) + + >>> output(Matrix([[1,0], [0,1]])) + + >>> output([1, x]) + + >>> output((1, x)) + + >>> output({1, x}) + + """ + if isinstance(exprs, str): + replacements, reduced_exprs = _cse_homogeneous( + sympify(exprs), **kwargs) + return replacements, repr(reduced_exprs) + if isinstance(exprs, (list, tuple, set)): + replacements, reduced_exprs = cse(exprs, **kwargs) + return replacements, type(exprs)(reduced_exprs) + if isinstance(exprs, dict): + keys = list(exprs.keys()) # In order to guarantee the order of the elements. + replacements, values = cse([exprs[k] for k in keys], **kwargs) + reduced_exprs = dict(zip(keys, values)) + return replacements, reduced_exprs + + try: + replacements, (reduced_exprs,) = cse(exprs, **kwargs) + except TypeError: # For example 'mpf' objects + return [], exprs + else: + return replacements, reduced_exprs diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_opts.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_opts.py new file mode 100644 index 0000000000000000000000000000000000000000..36a59857411de740ae47423442af88b118a3395d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/cse_opts.py @@ -0,0 +1,52 @@ +""" Optimizations of the expression tree representation for better CSE +opportunities. +""" +from sympy.core import Add, Basic, Mul +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.traversal import preorder_traversal + + +def sub_pre(e): + """ Replace y - x with -(x - y) if -1 can be extracted from y - x. + """ + # replacing Add, A, from which -1 can be extracted with -1*-A + adds = [a for a in e.atoms(Add) if a.could_extract_minus_sign()] + reps = {} + ignore = set() + for a in adds: + na = -a + if na.is_Mul: # e.g. MatExpr + ignore.add(a) + continue + reps[a] = Mul._from_args([S.NegativeOne, na]) + + e = e.xreplace(reps) + + # repeat again for persisting Adds but mark these with a leading 1, -1 + # e.g. y - x -> 1*-1*(x - y) + if isinstance(e, Basic): + negs = {} + for a in sorted(e.atoms(Add), key=default_sort_key): + if a in ignore: + continue + if a in reps: + negs[a] = reps[a] + elif a.could_extract_minus_sign(): + negs[a] = Mul._from_args([S.One, S.NegativeOne, -a]) + e = e.xreplace(negs) + return e + + +def sub_post(e): + """ Replace 1*-1*x with -x. + """ + replacements = [] + for node in preorder_traversal(e): + if isinstance(node, Mul) and \ + node.args[0] is S.One and node.args[1] is S.NegativeOne: + replacements.append((node, -Mul._from_args(node.args[2:]))) + for node, replacement in replacements: + e = e.xreplace({node: replacement}) + + return e diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/epathtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/epathtools.py new file mode 100644 index 0000000000000000000000000000000000000000..7be983ada63fd39d7d467acf9afd62b3a41a2d85 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/epathtools.py @@ -0,0 +1,352 @@ +"""Tools for manipulation of expressions using paths. """ + +from sympy.core import Basic + + +class EPath: + r""" + Manipulate expressions using paths. + + EPath grammar in EBNF notation:: + + literal ::= /[A-Za-z_][A-Za-z_0-9]*/ + number ::= /-?\d+/ + type ::= literal + attribute ::= literal "?" + all ::= "*" + slice ::= "[" number? (":" number? (":" number?)?)? "]" + range ::= all | slice + query ::= (type | attribute) ("|" (type | attribute))* + selector ::= range | query range? + path ::= "/" selector ("/" selector)* + + See the docstring of the epath() function. + + """ + + __slots__ = ("_path", "_epath") + + def __new__(cls, path): + """Construct new EPath. """ + if isinstance(path, EPath): + return path + + if not path: + raise ValueError("empty EPath") + + _path = path + + if path[0] == '/': + path = path[1:] + else: + raise NotImplementedError("non-root EPath") + + epath = [] + + for selector in path.split('/'): + selector = selector.strip() + + if not selector: + raise ValueError("empty selector") + + index = 0 + + for c in selector: + if c.isalnum() or c in ('_', '|', '?'): + index += 1 + else: + break + + attrs = [] + types = [] + + if index: + elements = selector[:index] + selector = selector[index:] + + for element in elements.split('|'): + element = element.strip() + + if not element: + raise ValueError("empty element") + + if element.endswith('?'): + attrs.append(element[:-1]) + else: + types.append(element) + + span = None + + if selector == '*': + pass + else: + if selector.startswith('['): + try: + i = selector.index(']') + except ValueError: + raise ValueError("expected ']', got EOL") + + _span, span = selector[1:i], [] + + if ':' not in _span: + span = int(_span) + else: + for elt in _span.split(':', 3): + if not elt: + span.append(None) + else: + span.append(int(elt)) + + span = slice(*span) + + selector = selector[i + 1:] + + if selector: + raise ValueError("trailing characters in selector") + + epath.append((attrs, types, span)) + + obj = object.__new__(cls) + + obj._path = _path + obj._epath = epath + + return obj + + def __repr__(self): + return "%s(%r)" % (self.__class__.__name__, self._path) + + def _get_ordered_args(self, expr): + """Sort ``expr.args`` using printing order. """ + if expr.is_Add: + return expr.as_ordered_terms() + elif expr.is_Mul: + return expr.as_ordered_factors() + else: + return expr.args + + def _hasattrs(self, expr, attrs) -> bool: + """Check if ``expr`` has any of ``attrs``. """ + return all(hasattr(expr, attr) for attr in attrs) + + def _hastypes(self, expr, types): + """Check if ``expr`` is any of ``types``. """ + _types = [ cls.__name__ for cls in expr.__class__.mro() ] + return bool(set(_types).intersection(types)) + + def _has(self, expr, attrs, types): + """Apply ``_hasattrs`` and ``_hastypes`` to ``expr``. """ + if not (attrs or types): + return True + + if attrs and self._hasattrs(expr, attrs): + return True + + if types and self._hastypes(expr, types): + return True + + return False + + def apply(self, expr, func, args=None, kwargs=None): + """ + Modify parts of an expression selected by a path. + + Examples + ======== + + >>> from sympy.simplify.epathtools import EPath + >>> from sympy import sin, cos, E + >>> from sympy.abc import x, y, z, t + + >>> path = EPath("/*/[0]/Symbol") + >>> expr = [((x, 1), 2), ((3, y), z)] + + >>> path.apply(expr, lambda expr: expr**2) + [((x**2, 1), 2), ((3, y**2), z)] + + >>> path = EPath("/*/*/Symbol") + >>> expr = t + sin(x + 1) + cos(x + y + E) + + >>> path.apply(expr, lambda expr: 2*expr) + t + sin(2*x + 1) + cos(2*x + 2*y + E) + + """ + def _apply(path, expr, func): + if not path: + return func(expr) + else: + selector, path = path[0], path[1:] + attrs, types, span = selector + + if isinstance(expr, Basic): + if not expr.is_Atom: + args, basic = self._get_ordered_args(expr), True + else: + return expr + elif hasattr(expr, '__iter__'): + args, basic = expr, False + else: + return expr + + args = list(args) + + if span is not None: + if isinstance(span, slice): + indices = range(*span.indices(len(args))) + else: + indices = [span] + else: + indices = range(len(args)) + + for i in indices: + try: + arg = args[i] + except IndexError: + continue + + if self._has(arg, attrs, types): + args[i] = _apply(path, arg, func) + + if basic: + return expr.func(*args) + else: + return expr.__class__(args) + + _args, _kwargs = args or (), kwargs or {} + _func = lambda expr: func(expr, *_args, **_kwargs) + + return _apply(self._epath, expr, _func) + + def select(self, expr): + """ + Retrieve parts of an expression selected by a path. + + Examples + ======== + + >>> from sympy.simplify.epathtools import EPath + >>> from sympy import sin, cos, E + >>> from sympy.abc import x, y, z, t + + >>> path = EPath("/*/[0]/Symbol") + >>> expr = [((x, 1), 2), ((3, y), z)] + + >>> path.select(expr) + [x, y] + + >>> path = EPath("/*/*/Symbol") + >>> expr = t + sin(x + 1) + cos(x + y + E) + + >>> path.select(expr) + [x, x, y] + + """ + result = [] + + def _select(path, expr): + if not path: + result.append(expr) + else: + selector, path = path[0], path[1:] + attrs, types, span = selector + + if isinstance(expr, Basic): + args = self._get_ordered_args(expr) + elif hasattr(expr, '__iter__'): + args = expr + else: + return + + if span is not None: + if isinstance(span, slice): + args = args[span] + else: + try: + args = [args[span]] + except IndexError: + return + + for arg in args: + if self._has(arg, attrs, types): + _select(path, arg) + + _select(self._epath, expr) + return result + + +def epath(path, expr=None, func=None, args=None, kwargs=None): + r""" + Manipulate parts of an expression selected by a path. + + Explanation + =========== + + This function allows to manipulate large nested expressions in single + line of code, utilizing techniques to those applied in XML processing + standards (e.g. XPath). + + If ``func`` is ``None``, :func:`epath` retrieves elements selected by + the ``path``. Otherwise it applies ``func`` to each matching element. + + Note that it is more efficient to create an EPath object and use the select + and apply methods of that object, since this will compile the path string + only once. This function should only be used as a convenient shortcut for + interactive use. + + This is the supported syntax: + + * select all: ``/*`` + Equivalent of ``for arg in args:``. + * select slice: ``/[0]`` or ``/[1:5]`` or ``/[1:5:2]`` + Supports standard Python's slice syntax. + * select by type: ``/list`` or ``/list|tuple`` + Emulates ``isinstance()``. + * select by attribute: ``/__iter__?`` + Emulates ``hasattr()``. + + Parameters + ========== + + path : str | EPath + A path as a string or a compiled EPath. + expr : Basic | iterable + An expression or a container of expressions. + func : callable (optional) + A callable that will be applied to matching parts. + args : tuple (optional) + Additional positional arguments to ``func``. + kwargs : dict (optional) + Additional keyword arguments to ``func``. + + Examples + ======== + + >>> from sympy.simplify.epathtools import epath + >>> from sympy import sin, cos, E + >>> from sympy.abc import x, y, z, t + + >>> path = "/*/[0]/Symbol" + >>> expr = [((x, 1), 2), ((3, y), z)] + + >>> epath(path, expr) + [x, y] + >>> epath(path, expr, lambda expr: expr**2) + [((x**2, 1), 2), ((3, y**2), z)] + + >>> path = "/*/*/Symbol" + >>> expr = t + sin(x + 1) + cos(x + y + E) + + >>> epath(path, expr) + [x, x, y] + >>> epath(path, expr, lambda expr: 2*expr) + t + sin(2*x + 1) + cos(2*x + 2*y + E) + + """ + _epath = EPath(path) + + if expr is None: + return _epath + if func is None: + return _epath.select(expr) + else: + return _epath.apply(expr, func, args, kwargs) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/fu.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/fu.py new file mode 100644 index 0000000000000000000000000000000000000000..a26706edca98385df0009a8ee41476a17d36420c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/fu.py @@ -0,0 +1,2112 @@ +from collections import defaultdict + +from sympy.core.add import Add +from sympy.core.cache import cacheit +from sympy.core.expr import Expr +from sympy.core.exprtools import Factors, gcd_terms, factor_terms +from sympy.core.function import expand_mul +from sympy.core.mul import Mul +from sympy.core.numbers import pi, I +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify +from sympy.core.traversal import bottom_up +from sympy.functions.combinatorial.factorials import binomial +from sympy.functions.elementary.hyperbolic import ( + cosh, sinh, tanh, coth, sech, csch, HyperbolicFunction) +from sympy.functions.elementary.trigonometric import ( + cos, sin, tan, cot, sec, csc, sqrt, TrigonometricFunction) +from sympy.ntheory.factor_ import perfect_power +from sympy.polys.polytools import factor +from sympy.strategies.tree import greedy +from sympy.strategies.core import identity, debug + +from sympy import SYMPY_DEBUG + + +# ================== Fu-like tools =========================== + + +def TR0(rv): + """Simplification of rational polynomials, trying to simplify + the expression, e.g. combine things like 3*x + 2*x, etc.... + """ + # although it would be nice to use cancel, it doesn't work + # with noncommutatives + return rv.normal().factor().expand() + + +def TR1(rv): + """Replace sec, csc with 1/cos, 1/sin + + Examples + ======== + + >>> from sympy.simplify.fu import TR1, sec, csc + >>> from sympy.abc import x + >>> TR1(2*csc(x) + sec(x)) + 1/cos(x) + 2/sin(x) + """ + + def f(rv): + if isinstance(rv, sec): + a = rv.args[0] + return S.One/cos(a) + elif isinstance(rv, csc): + a = rv.args[0] + return S.One/sin(a) + return rv + + return bottom_up(rv, f) + + +def TR2(rv): + """Replace tan and cot with sin/cos and cos/sin + + Examples + ======== + + >>> from sympy.simplify.fu import TR2 + >>> from sympy.abc import x + >>> from sympy import tan, cot, sin, cos + >>> TR2(tan(x)) + sin(x)/cos(x) + >>> TR2(cot(x)) + cos(x)/sin(x) + >>> TR2(tan(tan(x) - sin(x)/cos(x))) + 0 + + """ + + def f(rv): + if isinstance(rv, tan): + a = rv.args[0] + return sin(a)/cos(a) + elif isinstance(rv, cot): + a = rv.args[0] + return cos(a)/sin(a) + return rv + + return bottom_up(rv, f) + + +def TR2i(rv, half=False): + """Converts ratios involving sin and cos as follows:: + sin(x)/cos(x) -> tan(x) + sin(x)/(cos(x) + 1) -> tan(x/2) if half=True + + Examples + ======== + + >>> from sympy.simplify.fu import TR2i + >>> from sympy.abc import x, a + >>> from sympy import sin, cos + >>> TR2i(sin(x)/cos(x)) + tan(x) + + Powers of the numerator and denominator are also recognized + + >>> TR2i(sin(x)**2/(cos(x) + 1)**2, half=True) + tan(x/2)**2 + + The transformation does not take place unless assumptions allow + (i.e. the base must be positive or the exponent must be an integer + for both numerator and denominator) + + >>> TR2i(sin(x)**a/(cos(x) + 1)**a) + sin(x)**a/(cos(x) + 1)**a + + """ + + def f(rv): + if not rv.is_Mul: + return rv + + n, d = rv.as_numer_denom() + if n.is_Atom or d.is_Atom: + return rv + + def ok(k, e): + # initial filtering of factors + return ( + (e.is_integer or k.is_positive) and ( + k.func in (sin, cos) or (half and + k.is_Add and + len(k.args) >= 2 and + any(any(isinstance(ai, cos) or ai.is_Pow and ai.base is cos + for ai in Mul.make_args(a)) for a in k.args)))) + + n = n.as_powers_dict() + ndone = [(k, n.pop(k)) for k in list(n.keys()) if not ok(k, n[k])] + if not n: + return rv + + d = d.as_powers_dict() + ddone = [(k, d.pop(k)) for k in list(d.keys()) if not ok(k, d[k])] + if not d: + return rv + + # factoring if necessary + + def factorize(d, ddone): + newk = [] + for k in d: + if k.is_Add and len(k.args) > 1: + knew = factor(k) if half else factor_terms(k) + if knew != k: + newk.append((k, knew)) + if newk: + for i, (k, knew) in enumerate(newk): + del d[k] + newk[i] = knew + newk = Mul(*newk).as_powers_dict() + for k in newk: + v = d[k] + newk[k] + if ok(k, v): + d[k] = v + else: + ddone.append((k, v)) + del newk + factorize(n, ndone) + factorize(d, ddone) + + # joining + t = [] + for k in n: + if isinstance(k, sin): + a = cos(k.args[0], evaluate=False) + if a in d and d[a] == n[k]: + t.append(tan(k.args[0])**n[k]) + n[k] = d[a] = None + elif half: + a1 = 1 + a + if a1 in d and d[a1] == n[k]: + t.append((tan(k.args[0]/2))**n[k]) + n[k] = d[a1] = None + elif isinstance(k, cos): + a = sin(k.args[0], evaluate=False) + if a in d and d[a] == n[k]: + t.append(tan(k.args[0])**-n[k]) + n[k] = d[a] = None + elif half and k.is_Add and k.args[0] is S.One and \ + isinstance(k.args[1], cos): + a = sin(k.args[1].args[0], evaluate=False) + if a in d and d[a] == n[k] and (d[a].is_integer or \ + a.is_positive): + t.append(tan(a.args[0]/2)**-n[k]) + n[k] = d[a] = None + + if t: + rv = Mul(*(t + [b**e for b, e in n.items() if e]))/\ + Mul(*[b**e for b, e in d.items() if e]) + rv *= Mul(*[b**e for b, e in ndone])/Mul(*[b**e for b, e in ddone]) + + return rv + + return bottom_up(rv, f) + + +def TR3(rv): + """Induced formula: example sin(-a) = -sin(a) + + Examples + ======== + + >>> from sympy.simplify.fu import TR3 + >>> from sympy.abc import x, y + >>> from sympy import pi + >>> from sympy import cos + >>> TR3(cos(y - x*(y - x))) + cos(x*(x - y) + y) + >>> cos(pi/2 + x) + -sin(x) + >>> cos(30*pi/2 + x) + -cos(x) + + """ + from sympy.simplify.simplify import signsimp + + # Negative argument (already automatic for funcs like sin(-x) -> -sin(x) + # but more complicated expressions can use it, too). Also, trig angles + # between pi/4 and pi/2 are not reduced to an angle between 0 and pi/4. + # The following are automatically handled: + # Argument of type: pi/2 +/- angle + # Argument of type: pi +/- angle + # Argument of type : 2k*pi +/- angle + + def f(rv): + if not isinstance(rv, TrigonometricFunction): + return rv + rv = rv.func(signsimp(rv.args[0])) + if not isinstance(rv, TrigonometricFunction): + return rv + if (rv.args[0] - S.Pi/4).is_positive is (S.Pi/2 - rv.args[0]).is_positive is True: + fmap = {cos: sin, sin: cos, tan: cot, cot: tan, sec: csc, csc: sec} + rv = fmap[type(rv)](S.Pi/2 - rv.args[0]) + return rv + + # touch numbers iside of trig functions to let them automatically update + rv = rv.replace( + lambda x: isinstance(x, TrigonometricFunction), + lambda x: x.replace( + lambda n: n.is_number and n.is_Mul, + lambda n: n.func(*n.args))) + + return bottom_up(rv, f) + + +def TR4(rv): + """Identify values of special angles. + + a= 0 pi/6 pi/4 pi/3 pi/2 + ---------------------------------------------------- + sin(a) 0 1/2 sqrt(2)/2 sqrt(3)/2 1 + cos(a) 1 sqrt(3)/2 sqrt(2)/2 1/2 0 + tan(a) 0 sqt(3)/3 1 sqrt(3) -- + + Examples + ======== + + >>> from sympy import pi + >>> from sympy import cos, sin, tan, cot + >>> for s in (0, pi/6, pi/4, pi/3, pi/2): + ... print('%s %s %s %s' % (cos(s), sin(s), tan(s), cot(s))) + ... + 1 0 0 zoo + sqrt(3)/2 1/2 sqrt(3)/3 sqrt(3) + sqrt(2)/2 sqrt(2)/2 1 1 + 1/2 sqrt(3)/2 sqrt(3) sqrt(3)/3 + 0 1 zoo 0 + """ + # special values at 0, pi/6, pi/4, pi/3, pi/2 already handled + return rv.replace( + lambda x: + isinstance(x, TrigonometricFunction) and + (r:=x.args[0]/pi).is_Rational and r.q in (1, 2, 3, 4, 6), + lambda x: + x.func(x.args[0].func(*x.args[0].args))) + + +def _TR56(rv, f, g, h, max, pow): + """Helper for TR5 and TR6 to replace f**2 with h(g**2) + + Options + ======= + + max : controls size of exponent that can appear on f + e.g. if max=4 then f**4 will be changed to h(g**2)**2. + pow : controls whether the exponent must be a perfect power of 2 + e.g. if pow=True (and max >= 6) then f**6 will not be changed + but f**8 will be changed to h(g**2)**4 + + >>> from sympy.simplify.fu import _TR56 as T + >>> from sympy.abc import x + >>> from sympy import sin, cos + >>> h = lambda x: 1 - x + >>> T(sin(x)**3, sin, cos, h, 4, False) + (1 - cos(x)**2)*sin(x) + >>> T(sin(x)**6, sin, cos, h, 6, False) + (1 - cos(x)**2)**3 + >>> T(sin(x)**6, sin, cos, h, 6, True) + sin(x)**6 + >>> T(sin(x)**8, sin, cos, h, 10, True) + (1 - cos(x)**2)**4 + """ + + def _f(rv): + # I'm not sure if this transformation should target all even powers + # or only those expressible as powers of 2. Also, should it only + # make the changes in powers that appear in sums -- making an isolated + # change is not going to allow a simplification as far as I can tell. + if not (rv.is_Pow and rv.base.func == f): + return rv + if not rv.exp.is_real: + return rv + + if (rv.exp < 0) == True: + return rv + if (rv.exp > max) == True: + return rv + if rv.exp == 1: + return rv + if rv.exp == 2: + return h(g(rv.base.args[0])**2) + else: + if rv.exp % 2 == 1: + e = rv.exp//2 + return f(rv.base.args[0])*h(g(rv.base.args[0])**2)**e + elif rv.exp == 4: + e = 2 + elif not pow: + if rv.exp % 2: + return rv + e = rv.exp//2 + else: + p = perfect_power(rv.exp) + if not p: + return rv + e = rv.exp//2 + return h(g(rv.base.args[0])**2)**e + + return bottom_up(rv, _f) + + +def TR5(rv, max=4, pow=False): + """Replacement of sin**2 with 1 - cos(x)**2. + + See _TR56 docstring for advanced use of ``max`` and ``pow``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR5 + >>> from sympy.abc import x + >>> from sympy import sin + >>> TR5(sin(x)**2) + 1 - cos(x)**2 + >>> TR5(sin(x)**-2) # unchanged + sin(x)**(-2) + >>> TR5(sin(x)**4) + (1 - cos(x)**2)**2 + """ + return _TR56(rv, sin, cos, lambda x: 1 - x, max=max, pow=pow) + + +def TR6(rv, max=4, pow=False): + """Replacement of cos**2 with 1 - sin(x)**2. + + See _TR56 docstring for advanced use of ``max`` and ``pow``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR6 + >>> from sympy.abc import x + >>> from sympy import cos + >>> TR6(cos(x)**2) + 1 - sin(x)**2 + >>> TR6(cos(x)**-2) #unchanged + cos(x)**(-2) + >>> TR6(cos(x)**4) + (1 - sin(x)**2)**2 + """ + return _TR56(rv, cos, sin, lambda x: 1 - x, max=max, pow=pow) + + +def TR7(rv): + """Lowering the degree of cos(x)**2. + + Examples + ======== + + >>> from sympy.simplify.fu import TR7 + >>> from sympy.abc import x + >>> from sympy import cos + >>> TR7(cos(x)**2) + cos(2*x)/2 + 1/2 + >>> TR7(cos(x)**2 + 1) + cos(2*x)/2 + 3/2 + + """ + + def f(rv): + if not (rv.is_Pow and rv.base.func == cos and rv.exp == 2): + return rv + return (1 + cos(2*rv.base.args[0]))/2 + + return bottom_up(rv, f) + + +def TR8(rv, first=True): + """Converting products of ``cos`` and/or ``sin`` to a sum or + difference of ``cos`` and or ``sin`` terms. + + Examples + ======== + + >>> from sympy.simplify.fu import TR8 + >>> from sympy import cos, sin + >>> TR8(cos(2)*cos(3)) + cos(5)/2 + cos(1)/2 + >>> TR8(cos(2)*sin(3)) + sin(5)/2 + sin(1)/2 + >>> TR8(sin(2)*sin(3)) + -cos(5)/2 + cos(1)/2 + """ + + def f(rv): + if not ( + rv.is_Mul or + rv.is_Pow and + rv.base.func in (cos, sin) and + (rv.exp.is_integer or rv.base.is_positive)): + return rv + + if first: + n, d = [expand_mul(i) for i in rv.as_numer_denom()] + newn = TR8(n, first=False) + newd = TR8(d, first=False) + if newn != n or newd != d: + rv = gcd_terms(newn/newd) + if rv.is_Mul and rv.args[0].is_Rational and \ + len(rv.args) == 2 and rv.args[1].is_Add: + rv = Mul(*rv.as_coeff_Mul()) + return rv + + args = {cos: [], sin: [], None: []} + for a in Mul.make_args(rv): + if a.func in (cos, sin): + args[type(a)].append(a.args[0]) + elif (a.is_Pow and a.exp.is_Integer and a.exp > 0 and \ + a.base.func in (cos, sin)): + # XXX this is ok but pathological expression could be handled + # more efficiently as in TRmorrie + args[type(a.base)].extend([a.base.args[0]]*a.exp) + else: + args[None].append(a) + c = args[cos] + s = args[sin] + if not (c and s or len(c) > 1 or len(s) > 1): + return rv + + args = args[None] + n = min(len(c), len(s)) + for i in range(n): + a1 = s.pop() + a2 = c.pop() + args.append((sin(a1 + a2) + sin(a1 - a2))/2) + while len(c) > 1: + a1 = c.pop() + a2 = c.pop() + args.append((cos(a1 + a2) + cos(a1 - a2))/2) + if c: + args.append(cos(c.pop())) + while len(s) > 1: + a1 = s.pop() + a2 = s.pop() + args.append((-cos(a1 + a2) + cos(a1 - a2))/2) + if s: + args.append(sin(s.pop())) + return TR8(expand_mul(Mul(*args))) + + return bottom_up(rv, f) + + +def TR9(rv): + """Sum of ``cos`` or ``sin`` terms as a product of ``cos`` or ``sin``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR9 + >>> from sympy import cos, sin + >>> TR9(cos(1) + cos(2)) + 2*cos(1/2)*cos(3/2) + >>> TR9(cos(1) + 2*sin(1) + 2*sin(2)) + cos(1) + 4*sin(3/2)*cos(1/2) + + If no change is made by TR9, no re-arrangement of the + expression will be made. For example, though factoring + of common term is attempted, if the factored expression + was not changed, the original expression will be returned: + + >>> TR9(cos(3) + cos(3)*cos(2)) + cos(3) + cos(2)*cos(3) + + """ + + def f(rv): + if not rv.is_Add: + return rv + + def do(rv, first=True): + # cos(a)+/-cos(b) can be combined into a product of cosines and + # sin(a)+/-sin(b) can be combined into a product of cosine and + # sine. + # + # If there are more than two args, the pairs which "work" will + # have a gcd extractable and the remaining two terms will have + # the above structure -- all pairs must be checked to find the + # ones that work. args that don't have a common set of symbols + # are skipped since this doesn't lead to a simpler formula and + # also has the arbitrariness of combining, for example, the x + # and y term instead of the y and z term in something like + # cos(x) + cos(y) + cos(z). + + if not rv.is_Add: + return rv + + args = list(ordered(rv.args)) + if len(args) != 2: + hit = False + for i in range(len(args)): + ai = args[i] + if ai is None: + continue + for j in range(i + 1, len(args)): + aj = args[j] + if aj is None: + continue + was = ai + aj + new = do(was) + if new != was: + args[i] = new # update in place + args[j] = None + hit = True + break # go to next i + if hit: + rv = Add(*[_f for _f in args if _f]) + if rv.is_Add: + rv = do(rv) + + return rv + + # two-arg Add + split = trig_split(*args) + if not split: + return rv + gcd, n1, n2, a, b, iscos = split + + # application of rule if possible + if iscos: + if n1 == n2: + return gcd*n1*2*cos((a + b)/2)*cos((a - b)/2) + if n1 < 0: + a, b = b, a + return -2*gcd*sin((a + b)/2)*sin((a - b)/2) + else: + if n1 == n2: + return gcd*n1*2*sin((a + b)/2)*cos((a - b)/2) + if n1 < 0: + a, b = b, a + return 2*gcd*cos((a + b)/2)*sin((a - b)/2) + + return process_common_addends(rv, do) # DON'T sift by free symbols + + return bottom_up(rv, f) + + +def TR10(rv, first=True): + """Separate sums in ``cos`` and ``sin``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR10 + >>> from sympy.abc import a, b, c + >>> from sympy import cos, sin + >>> TR10(cos(a + b)) + -sin(a)*sin(b) + cos(a)*cos(b) + >>> TR10(sin(a + b)) + sin(a)*cos(b) + sin(b)*cos(a) + >>> TR10(sin(a + b + c)) + (-sin(a)*sin(b) + cos(a)*cos(b))*sin(c) + \ + (sin(a)*cos(b) + sin(b)*cos(a))*cos(c) + """ + + def f(rv): + if rv.func not in (cos, sin): + return rv + + f = rv.func + arg = rv.args[0] + if arg.is_Add: + if first: + args = list(ordered(arg.args)) + else: + args = list(arg.args) + a = args.pop() + b = Add._from_args(args) + if b.is_Add: + if f == sin: + return sin(a)*TR10(cos(b), first=False) + \ + cos(a)*TR10(sin(b), first=False) + else: + return cos(a)*TR10(cos(b), first=False) - \ + sin(a)*TR10(sin(b), first=False) + else: + if f == sin: + return sin(a)*cos(b) + cos(a)*sin(b) + else: + return cos(a)*cos(b) - sin(a)*sin(b) + return rv + + return bottom_up(rv, f) + + +def TR10i(rv): + """Sum of products to function of sum. + + Examples + ======== + + >>> from sympy.simplify.fu import TR10i + >>> from sympy import cos, sin, sqrt + >>> from sympy.abc import x + + >>> TR10i(cos(1)*cos(3) + sin(1)*sin(3)) + cos(2) + >>> TR10i(cos(1)*sin(3) + sin(1)*cos(3) + cos(3)) + cos(3) + sin(4) + >>> TR10i(sqrt(2)*cos(x)*x + sqrt(6)*sin(x)*x) + 2*sqrt(2)*x*sin(x + pi/6) + + """ + def f(rv): + if not rv.is_Add: + return rv + + def do(rv, first=True): + # args which can be expressed as A*(cos(a)*cos(b)+/-sin(a)*sin(b)) + # or B*(cos(a)*sin(b)+/-cos(b)*sin(a)) can be combined into + # A*f(a+/-b) where f is either sin or cos. + # + # If there are more than two args, the pairs which "work" will have + # a gcd extractable and the remaining two terms will have the above + # structure -- all pairs must be checked to find the ones that + # work. + + if not rv.is_Add: + return rv + + args = list(ordered(rv.args)) + if len(args) != 2: + hit = False + for i in range(len(args)): + ai = args[i] + if ai is None: + continue + for j in range(i + 1, len(args)): + aj = args[j] + if aj is None: + continue + was = ai + aj + new = do(was) + if new != was: + args[i] = new # update in place + args[j] = None + hit = True + break # go to next i + if hit: + rv = Add(*[_f for _f in args if _f]) + if rv.is_Add: + rv = do(rv) + + return rv + + # two-arg Add + split = trig_split(*args, two=True) + if not split: + return rv + gcd, n1, n2, a, b, same = split + + # identify and get c1 to be cos then apply rule if possible + if same: # coscos, sinsin + gcd = n1*gcd + if n1 == n2: + return gcd*cos(a - b) + return gcd*cos(a + b) + else: #cossin, cossin + gcd = n1*gcd + if n1 == n2: + return gcd*sin(a + b) + return gcd*sin(b - a) + + rv = process_common_addends( + rv, do, lambda x: tuple(ordered(x.free_symbols))) + + # need to check for inducible pairs in ratio of sqrt(3):1 that + # appeared in different lists when sorting by coefficient + while rv.is_Add: + byrad = defaultdict(list) + for a in rv.args: + hit = 0 + if a.is_Mul: + for ai in a.args: + if ai.is_Pow and ai.exp is S.Half and \ + ai.base.is_Integer: + byrad[ai].append(a) + hit = 1 + break + if not hit: + byrad[S.One].append(a) + + # no need to check all pairs -- just check for the onees + # that have the right ratio + args = [] + for a in byrad: + for b in [_ROOT3()*a, _invROOT3()]: + if b in byrad: + for i in range(len(byrad[a])): + if byrad[a][i] is None: + continue + for j in range(len(byrad[b])): + if byrad[b][j] is None: + continue + was = Add(byrad[a][i] + byrad[b][j]) + new = do(was) + if new != was: + args.append(new) + byrad[a][i] = None + byrad[b][j] = None + break + if args: + rv = Add(*(args + [Add(*[_f for _f in v if _f]) + for v in byrad.values()])) + else: + rv = do(rv) # final pass to resolve any new inducible pairs + break + + return rv + + return bottom_up(rv, f) + + +def TR11(rv, base=None): + """Function of double angle to product. The ``base`` argument can be used + to indicate what is the un-doubled argument, e.g. if 3*pi/7 is the base + then cosine and sine functions with argument 6*pi/7 will be replaced. + + Examples + ======== + + >>> from sympy.simplify.fu import TR11 + >>> from sympy import cos, sin, pi + >>> from sympy.abc import x + >>> TR11(sin(2*x)) + 2*sin(x)*cos(x) + >>> TR11(cos(2*x)) + -sin(x)**2 + cos(x)**2 + >>> TR11(sin(4*x)) + 4*(-sin(x)**2 + cos(x)**2)*sin(x)*cos(x) + >>> TR11(sin(4*x/3)) + 4*(-sin(x/3)**2 + cos(x/3)**2)*sin(x/3)*cos(x/3) + + If the arguments are simply integers, no change is made + unless a base is provided: + + >>> TR11(cos(2)) + cos(2) + >>> TR11(cos(4), 2) + -sin(2)**2 + cos(2)**2 + + There is a subtle issue here in that autosimplification will convert + some higher angles to lower angles + + >>> cos(6*pi/7) + cos(3*pi/7) + -cos(pi/7) + cos(3*pi/7) + + The 6*pi/7 angle is now pi/7 but can be targeted with TR11 by supplying + the 3*pi/7 base: + + >>> TR11(_, 3*pi/7) + -sin(3*pi/7)**2 + cos(3*pi/7)**2 + cos(3*pi/7) + + """ + + def f(rv): + if rv.func not in (cos, sin): + return rv + + if base: + f = rv.func + t = f(base*2) + co = S.One + if t.is_Mul: + co, t = t.as_coeff_Mul() + if t.func not in (cos, sin): + return rv + if rv.args[0] == t.args[0]: + c = cos(base) + s = sin(base) + if f is cos: + return (c**2 - s**2)/co + else: + return 2*c*s/co + return rv + + elif not rv.args[0].is_Number: + # make a change if the leading coefficient's numerator is + # divisible by 2 + c, m = rv.args[0].as_coeff_Mul(rational=True) + if c.p % 2 == 0: + arg = c.p//2*m/c.q + c = TR11(cos(arg)) + s = TR11(sin(arg)) + if rv.func == sin: + rv = 2*s*c + else: + rv = c**2 - s**2 + return rv + + return bottom_up(rv, f) + + +def _TR11(rv): + """ + Helper for TR11 to find half-arguments for sin in factors of + num/den that appear in cos or sin factors in the den/num. + + Examples + ======== + + >>> from sympy.simplify.fu import TR11, _TR11 + >>> from sympy import cos, sin + >>> from sympy.abc import x + >>> TR11(sin(x/3)/(cos(x/6))) + sin(x/3)/cos(x/6) + >>> _TR11(sin(x/3)/(cos(x/6))) + 2*sin(x/6) + >>> TR11(sin(x/6)/(sin(x/3))) + sin(x/6)/sin(x/3) + >>> _TR11(sin(x/6)/(sin(x/3))) + 1/(2*cos(x/6)) + + """ + def f(rv): + if not isinstance(rv, Expr): + return rv + + def sincos_args(flat): + # find arguments of sin and cos that + # appears as bases in args of flat + # and have Integer exponents + args = defaultdict(set) + for fi in Mul.make_args(flat): + b, e = fi.as_base_exp() + if e.is_Integer and e > 0: + if b.func in (cos, sin): + args[type(b)].add(b.args[0]) + return args + num_args, den_args = map(sincos_args, rv.as_numer_denom()) + def handle_match(rv, num_args, den_args): + # for arg in sin args of num_args, look for arg/2 + # in den_args and pass this half-angle to TR11 + # for handling in rv + for narg in num_args[sin]: + half = narg/2 + if half in den_args[cos]: + func = cos + elif half in den_args[sin]: + func = sin + else: + continue + rv = TR11(rv, half) + den_args[func].remove(half) + return rv + # sin in num, sin or cos in den + rv = handle_match(rv, num_args, den_args) + # sin in den, sin or cos in num + rv = handle_match(rv, den_args, num_args) + return rv + + return bottom_up(rv, f) + + +def TR12(rv, first=True): + """Separate sums in ``tan``. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import tan + >>> from sympy.simplify.fu import TR12 + >>> TR12(tan(x + y)) + (tan(x) + tan(y))/(-tan(x)*tan(y) + 1) + """ + + def f(rv): + if not rv.func == tan: + return rv + + arg = rv.args[0] + if arg.is_Add: + if first: + args = list(ordered(arg.args)) + else: + args = list(arg.args) + a = args.pop() + b = Add._from_args(args) + if b.is_Add: + tb = TR12(tan(b), first=False) + else: + tb = tan(b) + return (tan(a) + tb)/(1 - tan(a)*tb) + return rv + + return bottom_up(rv, f) + + +def TR12i(rv): + """Combine tan arguments as + (tan(y) + tan(x))/(tan(x)*tan(y) - 1) -> -tan(x + y). + + Examples + ======== + + >>> from sympy.simplify.fu import TR12i + >>> from sympy import tan + >>> from sympy.abc import a, b, c + >>> ta, tb, tc = [tan(i) for i in (a, b, c)] + >>> TR12i((ta + tb)/(-ta*tb + 1)) + tan(a + b) + >>> TR12i((ta + tb)/(ta*tb - 1)) + -tan(a + b) + >>> TR12i((-ta - tb)/(ta*tb - 1)) + tan(a + b) + >>> eq = (ta + tb)/(-ta*tb + 1)**2*(-3*ta - 3*tc)/(2*(ta*tc - 1)) + >>> TR12i(eq.expand()) + -3*tan(a + b)*tan(a + c)/(2*(tan(a) + tan(b) - 1)) + """ + def f(rv): + if not (rv.is_Add or rv.is_Mul or rv.is_Pow): + return rv + + n, d = rv.as_numer_denom() + if not d.args or not n.args: + return rv + + dok = {} + + def ok(di): + m = as_f_sign_1(di) + if m: + g, f, s = m + if s is S.NegativeOne and f.is_Mul and len(f.args) == 2 and \ + all(isinstance(fi, tan) for fi in f.args): + return g, f + + d_args = list(Mul.make_args(d)) + for i, di in enumerate(d_args): + m = ok(di) + if m: + g, t = m + s = Add(*[_.args[0] for _ in t.args]) + dok[s] = S.One + d_args[i] = g + continue + if di.is_Add: + di = factor(di) + if di.is_Mul: + d_args.extend(di.args) + d_args[i] = S.One + elif di.is_Pow and (di.exp.is_integer or di.base.is_positive): + m = ok(di.base) + if m: + g, t = m + s = Add(*[_.args[0] for _ in t.args]) + dok[s] = di.exp + d_args[i] = g**di.exp + else: + di = factor(di) + if di.is_Mul: + d_args.extend(di.args) + d_args[i] = S.One + if not dok: + return rv + + def ok(ni): + if ni.is_Add and len(ni.args) == 2: + a, b = ni.args + if isinstance(a, tan) and isinstance(b, tan): + return a, b + n_args = list(Mul.make_args(factor_terms(n))) + hit = False + for i, ni in enumerate(n_args): + m = ok(ni) + if not m: + m = ok(-ni) + if m: + n_args[i] = S.NegativeOne + else: + if ni.is_Add: + ni = factor(ni) + if ni.is_Mul: + n_args.extend(ni.args) + n_args[i] = S.One + continue + elif ni.is_Pow and ( + ni.exp.is_integer or ni.base.is_positive): + m = ok(ni.base) + if m: + n_args[i] = S.One + else: + ni = factor(ni) + if ni.is_Mul: + n_args.extend(ni.args) + n_args[i] = S.One + continue + else: + continue + else: + n_args[i] = S.One + hit = True + s = Add(*[_.args[0] for _ in m]) + ed = dok[s] + newed = ed.extract_additively(S.One) + if newed is not None: + if newed: + dok[s] = newed + else: + dok.pop(s) + n_args[i] *= -tan(s) + + if hit: + rv = Mul(*n_args)/Mul(*d_args)/Mul(*[(Add(*[ + tan(a) for a in i.args]) - 1)**e for i, e in dok.items()]) + + return rv + + return bottom_up(rv, f) + + +def TR13(rv): + """Change products of ``tan`` or ``cot``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR13 + >>> from sympy import tan, cot + >>> TR13(tan(3)*tan(2)) + -tan(2)/tan(5) - tan(3)/tan(5) + 1 + >>> TR13(cot(3)*cot(2)) + cot(2)*cot(5) + 1 + cot(3)*cot(5) + """ + + def f(rv): + if not rv.is_Mul: + return rv + + # XXX handle products of powers? or let power-reducing handle it? + args = {tan: [], cot: [], None: []} + for a in Mul.make_args(rv): + if a.func in (tan, cot): + args[type(a)].append(a.args[0]) + else: + args[None].append(a) + t = args[tan] + c = args[cot] + if len(t) < 2 and len(c) < 2: + return rv + args = args[None] + while len(t) > 1: + t1 = t.pop() + t2 = t.pop() + args.append(1 - (tan(t1)/tan(t1 + t2) + tan(t2)/tan(t1 + t2))) + if t: + args.append(tan(t.pop())) + while len(c) > 1: + t1 = c.pop() + t2 = c.pop() + args.append(1 + cot(t1)*cot(t1 + t2) + cot(t2)*cot(t1 + t2)) + if c: + args.append(cot(c.pop())) + return Mul(*args) + + return bottom_up(rv, f) + + +def TRmorrie(rv): + """Returns cos(x)*cos(2*x)*...*cos(2**(k-1)*x) -> sin(2**k*x)/(2**k*sin(x)) + + Examples + ======== + + >>> from sympy.simplify.fu import TRmorrie, TR8, TR3 + >>> from sympy.abc import x + >>> from sympy import Mul, cos, pi + >>> TRmorrie(cos(x)*cos(2*x)) + sin(4*x)/(4*sin(x)) + >>> TRmorrie(7*Mul(*[cos(x) for x in range(10)])) + 7*sin(12)*sin(16)*cos(5)*cos(7)*cos(9)/(64*sin(1)*sin(3)) + + Sometimes autosimplification will cause a power to be + not recognized. e.g. in the following, cos(4*pi/7) automatically + simplifies to -cos(3*pi/7) so only 2 of the 3 terms are + recognized: + + >>> TRmorrie(cos(pi/7)*cos(2*pi/7)*cos(4*pi/7)) + -sin(3*pi/7)*cos(3*pi/7)/(4*sin(pi/7)) + + A touch by TR8 resolves the expression to a Rational + + >>> TR8(_) + -1/8 + + In this case, if eq is unsimplified, the answer is obtained + directly: + + >>> eq = cos(pi/9)*cos(2*pi/9)*cos(3*pi/9)*cos(4*pi/9) + >>> TRmorrie(eq) + 1/16 + + But if angles are made canonical with TR3 then the answer + is not simplified without further work: + + >>> TR3(eq) + sin(pi/18)*cos(pi/9)*cos(2*pi/9)/2 + >>> TRmorrie(_) + sin(pi/18)*sin(4*pi/9)/(8*sin(pi/9)) + >>> TR8(_) + cos(7*pi/18)/(16*sin(pi/9)) + >>> TR3(_) + 1/16 + + The original expression would have resolve to 1/16 directly with TR8, + however: + + >>> TR8(eq) + 1/16 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Morrie%27s_law + + """ + + def f(rv, first=True): + if not rv.is_Mul: + return rv + if first: + n, d = rv.as_numer_denom() + return f(n, 0)/f(d, 0) + + args = defaultdict(list) + coss = {} + other = [] + for c in rv.args: + b, e = c.as_base_exp() + if e.is_Integer and isinstance(b, cos): + co, a = b.args[0].as_coeff_Mul() + args[a].append(co) + coss[b] = e + else: + other.append(c) + + new = [] + for a in args: + c = args[a] + c.sort() + while c: + k = 0 + cc = ci = c[0] + while cc in c: + k += 1 + cc *= 2 + if k > 1: + newarg = sin(2**k*ci*a)/2**k/sin(ci*a) + # see how many times this can be taken + take = None + ccs = [] + for i in range(k): + cc /= 2 + key = cos(a*cc, evaluate=False) + ccs.append(cc) + take = min(coss[key], take or coss[key]) + # update exponent counts + for i in range(k): + cc = ccs.pop() + key = cos(a*cc, evaluate=False) + coss[key] -= take + if not coss[key]: + c.remove(cc) + new.append(newarg**take) + else: + b = cos(c.pop(0)*a) + other.append(b**coss[b]) + + if new: + rv = Mul(*(new + other + [ + cos(k*a, evaluate=False) for a in args for k in args[a]])) + + return rv + + return bottom_up(rv, f) + + +def TR14(rv, first=True): + """Convert factored powers of sin and cos identities into simpler + expressions. + + Examples + ======== + + >>> from sympy.simplify.fu import TR14 + >>> from sympy.abc import x, y + >>> from sympy import cos, sin + >>> TR14((cos(x) - 1)*(cos(x) + 1)) + -sin(x)**2 + >>> TR14((sin(x) - 1)*(sin(x) + 1)) + -cos(x)**2 + >>> p1 = (cos(x) + 1)*(cos(x) - 1) + >>> p2 = (cos(y) - 1)*2*(cos(y) + 1) + >>> p3 = (3*(cos(y) - 1))*(3*(cos(y) + 1)) + >>> TR14(p1*p2*p3*(x - 1)) + -18*(x - 1)*sin(x)**2*sin(y)**4 + + """ + + def f(rv): + if not rv.is_Mul: + return rv + + if first: + # sort them by location in numerator and denominator + # so the code below can just deal with positive exponents + n, d = rv.as_numer_denom() + if d is not S.One: + newn = TR14(n, first=False) + newd = TR14(d, first=False) + if newn != n or newd != d: + rv = newn/newd + return rv + + other = [] + process = [] + for a in rv.args: + if a.is_Pow: + b, e = a.as_base_exp() + if not (e.is_integer or b.is_positive): + other.append(a) + continue + a = b + else: + e = S.One + m = as_f_sign_1(a) + if not m or m[1].func not in (cos, sin): + if e is S.One: + other.append(a) + else: + other.append(a**e) + continue + g, f, si = m + process.append((g, e.is_Number, e, f, si, a)) + + # sort them to get like terms next to each other + process = list(ordered(process)) + + # keep track of whether there was any change + nother = len(other) + + # access keys + keys = (g, t, e, f, si, a) = list(range(6)) + + while process: + A = process.pop(0) + if process: + B = process[0] + + if A[e].is_Number and B[e].is_Number: + # both exponents are numbers + if A[f] == B[f]: + if A[si] != B[si]: + B = process.pop(0) + take = min(A[e], B[e]) + + # reinsert any remainder + # the B will likely sort after A so check it first + if B[e] != take: + rem = [B[i] for i in keys] + rem[e] -= take + process.insert(0, rem) + elif A[e] != take: + rem = [A[i] for i in keys] + rem[e] -= take + process.insert(0, rem) + + if isinstance(A[f], cos): + t = sin + else: + t = cos + other.append((-A[g]*B[g]*t(A[f].args[0])**2)**take) + continue + + elif A[e] == B[e]: + # both exponents are equal symbols + if A[f] == B[f]: + if A[si] != B[si]: + B = process.pop(0) + take = A[e] + if isinstance(A[f], cos): + t = sin + else: + t = cos + other.append((-A[g]*B[g]*t(A[f].args[0])**2)**take) + continue + + # either we are done or neither condition above applied + other.append(A[a]**A[e]) + + if len(other) != nother: + rv = Mul(*other) + + return rv + + return bottom_up(rv, f) + + +def TR15(rv, max=4, pow=False): + """Convert sin(x)**-2 to 1 + cot(x)**2. + + See _TR56 docstring for advanced use of ``max`` and ``pow``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR15 + >>> from sympy.abc import x + >>> from sympy import sin + >>> TR15(1 - 1/sin(x)**2) + -cot(x)**2 + + """ + + def f(rv): + if not (isinstance(rv, Pow) and isinstance(rv.base, sin)): + return rv + + e = rv.exp + if e % 2 == 1: + return TR15(rv.base**(e + 1))/rv.base + + ia = 1/rv + a = _TR56(ia, sin, cot, lambda x: 1 + x, max=max, pow=pow) + if a != ia: + rv = a + return rv + + return bottom_up(rv, f) + + +def TR16(rv, max=4, pow=False): + """Convert cos(x)**-2 to 1 + tan(x)**2. + + See _TR56 docstring for advanced use of ``max`` and ``pow``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR16 + >>> from sympy.abc import x + >>> from sympy import cos + >>> TR16(1 - 1/cos(x)**2) + -tan(x)**2 + + """ + + def f(rv): + if not (isinstance(rv, Pow) and isinstance(rv.base, cos)): + return rv + + e = rv.exp + if e % 2 == 1: + return TR15(rv.base**(e + 1))/rv.base + + ia = 1/rv + a = _TR56(ia, cos, tan, lambda x: 1 + x, max=max, pow=pow) + if a != ia: + rv = a + return rv + + return bottom_up(rv, f) + + +def TR111(rv): + """Convert f(x)**-i to g(x)**i where either ``i`` is an integer + or the base is positive and f, g are: tan, cot; sin, csc; or cos, sec. + + Examples + ======== + + >>> from sympy.simplify.fu import TR111 + >>> from sympy.abc import x + >>> from sympy import tan + >>> TR111(1 - 1/tan(x)**2) + 1 - cot(x)**2 + + """ + + def f(rv): + if not ( + isinstance(rv, Pow) and + (rv.base.is_positive or rv.exp.is_integer and rv.exp.is_negative)): + return rv + + if isinstance(rv.base, tan): + return cot(rv.base.args[0])**-rv.exp + elif isinstance(rv.base, sin): + return csc(rv.base.args[0])**-rv.exp + elif isinstance(rv.base, cos): + return sec(rv.base.args[0])**-rv.exp + return rv + + return bottom_up(rv, f) + + +def TR22(rv, max=4, pow=False): + """Convert tan(x)**2 to sec(x)**2 - 1 and cot(x)**2 to csc(x)**2 - 1. + + See _TR56 docstring for advanced use of ``max`` and ``pow``. + + Examples + ======== + + >>> from sympy.simplify.fu import TR22 + >>> from sympy.abc import x + >>> from sympy import tan, cot + >>> TR22(1 + tan(x)**2) + sec(x)**2 + >>> TR22(1 + cot(x)**2) + csc(x)**2 + + """ + + def f(rv): + if not (isinstance(rv, Pow) and rv.base.func in (cot, tan)): + return rv + + rv = _TR56(rv, tan, sec, lambda x: x - 1, max=max, pow=pow) + rv = _TR56(rv, cot, csc, lambda x: x - 1, max=max, pow=pow) + return rv + + return bottom_up(rv, f) + + +def TRpower(rv): + """Convert sin(x)**n and cos(x)**n with positive n to sums. + + Examples + ======== + + >>> from sympy.simplify.fu import TRpower + >>> from sympy.abc import x + >>> from sympy import cos, sin + >>> TRpower(sin(x)**6) + -15*cos(2*x)/32 + 3*cos(4*x)/16 - cos(6*x)/32 + 5/16 + >>> TRpower(sin(x)**3*cos(2*x)**4) + (3*sin(x)/4 - sin(3*x)/4)*(cos(4*x)/2 + cos(8*x)/8 + 3/8) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/List_of_trigonometric_identities#Power-reduction_formulae + + """ + + def f(rv): + if not (isinstance(rv, Pow) and isinstance(rv.base, (sin, cos))): + return rv + b, n = rv.as_base_exp() + x = b.args[0] + if n.is_Integer and n.is_positive: + if n.is_odd and isinstance(b, cos): + rv = 2**(1-n)*Add(*[binomial(n, k)*cos((n - 2*k)*x) + for k in range((n + 1)/2)]) + elif n.is_odd and isinstance(b, sin): + rv = 2**(1-n)*S.NegativeOne**((n-1)/2)*Add(*[binomial(n, k)* + S.NegativeOne**k*sin((n - 2*k)*x) for k in range((n + 1)/2)]) + elif n.is_even and isinstance(b, cos): + rv = 2**(1-n)*Add(*[binomial(n, k)*cos((n - 2*k)*x) + for k in range(n/2)]) + elif n.is_even and isinstance(b, sin): + rv = 2**(1-n)*S.NegativeOne**(n/2)*Add(*[binomial(n, k)* + S.NegativeOne**k*cos((n - 2*k)*x) for k in range(n/2)]) + if n.is_even: + rv += 2**(-n)*binomial(n, n/2) + return rv + + return bottom_up(rv, f) + + +def L(rv): + """Return count of trigonometric functions in expression. + + Examples + ======== + + >>> from sympy.simplify.fu import L + >>> from sympy.abc import x + >>> from sympy import cos, sin + >>> L(cos(x)+sin(x)) + 2 + """ + return S(rv.count(TrigonometricFunction)) + + +# ============== end of basic Fu-like tools ===================== + +if SYMPY_DEBUG: + (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, + TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22 + )= list(map(debug, + (TR0, TR1, TR2, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TR10, TR11, TR12, TR13, + TR2i, TRmorrie, TR14, TR15, TR16, TR12i, TR111, TR22))) + + +# tuples are chains -- (f, g) -> lambda x: g(f(x)) +# lists are choices -- [f, g] -> lambda x: min(f(x), g(x), key=objective) + +CTR1 = [(TR5, TR0), (TR6, TR0), identity] + +CTR2 = (TR11, [(TR5, TR0), (TR6, TR0), TR0]) + +CTR3 = [(TRmorrie, TR8, TR0), (TRmorrie, TR8, TR10i, TR0), identity] + +CTR4 = [(TR4, TR10i), identity] + +RL1 = (TR4, TR3, TR4, TR12, TR4, TR13, TR4, TR0) + + +# XXX it's a little unclear how this one is to be implemented +# see Fu paper of reference, page 7. What is the Union symbol referring to? +# The diagram shows all these as one chain of transformations, but the +# text refers to them being applied independently. Also, a break +# if L starts to increase has not been implemented. +RL2 = [ + (TR4, TR3, TR10, TR4, TR3, TR11), + (TR5, TR7, TR11, TR4), + (CTR3, CTR1, TR9, CTR2, TR4, TR9, TR9, CTR4), + identity, + ] + + +def fu(rv, measure=lambda x: (L(x), x.count_ops())): + """Attempt to simplify expression by using transformation rules given + in the algorithm by Fu et al. + + :func:`fu` will try to minimize the objective function ``measure``. + By default this first minimizes the number of trig terms and then minimizes + the number of total operations. + + Examples + ======== + + >>> from sympy.simplify.fu import fu + >>> from sympy import cos, sin, tan, pi, S, sqrt + >>> from sympy.abc import x, y, a, b + + >>> fu(sin(50)**2 + cos(50)**2 + sin(pi/6)) + 3/2 + >>> fu(sqrt(6)*cos(x) + sqrt(2)*sin(x)) + 2*sqrt(2)*sin(x + pi/3) + + CTR1 example + + >>> eq = sin(x)**4 - cos(y)**2 + sin(y)**2 + 2*cos(x)**2 + >>> fu(eq) + cos(x)**4 - 2*cos(y)**2 + 2 + + CTR2 example + + >>> fu(S.Half - cos(2*x)/2) + sin(x)**2 + + CTR3 example + + >>> fu(sin(a)*(cos(b) - sin(b)) + cos(a)*(sin(b) + cos(b))) + sqrt(2)*sin(a + b + pi/4) + + CTR4 example + + >>> fu(sqrt(3)*cos(x)/2 + sin(x)/2) + sin(x + pi/3) + + Example 1 + + >>> fu(1-sin(2*x)**2/4-sin(y)**2-cos(x)**4) + -cos(x)**2 + cos(y)**2 + + Example 2 + + >>> fu(cos(4*pi/9)) + sin(pi/18) + >>> fu(cos(pi/9)*cos(2*pi/9)*cos(3*pi/9)*cos(4*pi/9)) + 1/16 + + Example 3 + + >>> fu(tan(7*pi/18)+tan(5*pi/18)-sqrt(3)*tan(5*pi/18)*tan(7*pi/18)) + -sqrt(3) + + Objective function example + + >>> fu(sin(x)/cos(x)) # default objective function + tan(x) + >>> fu(sin(x)/cos(x), measure=lambda x: -x.count_ops()) # maximize op count + sin(x)/cos(x) + + References + ========== + + .. [1] https://www.sciencedirect.com/science/article/pii/S0895717706001609 + """ + fRL1 = greedy(RL1, measure) + fRL2 = greedy(RL2, measure) + + was = rv + rv = sympify(rv) + if not isinstance(rv, Expr): + return rv.func(*[fu(a, measure=measure) for a in rv.args]) + rv = TR1(rv) + if rv.has(tan, cot): + rv1 = fRL1(rv) + if (measure(rv1) < measure(rv)): + rv = rv1 + if rv.has(tan, cot): + rv = TR2(rv) + if rv.has(sin, cos): + rv1 = fRL2(rv) + rv2 = TR8(TRmorrie(rv1)) + rv = min([was, rv, rv1, rv2], key=measure) + return min(TR2i(rv), rv, key=measure) + + +def process_common_addends(rv, do, key2=None, key1=True): + """Apply ``do`` to addends of ``rv`` that (if ``key1=True``) share at least + a common absolute value of their coefficient and the value of ``key2`` when + applied to the argument. If ``key1`` is False ``key2`` must be supplied and + will be the only key applied. + """ + + # collect by absolute value of coefficient and key2 + absc = defaultdict(list) + if key1: + for a in rv.args: + c, a = a.as_coeff_Mul() + if c < 0: + c = -c + a = -a # put the sign on `a` + absc[(c, key2(a) if key2 else 1)].append(a) + elif key2: + for a in rv.args: + absc[(S.One, key2(a))].append(a) + else: + raise ValueError('must have at least one key') + + args = [] + hit = False + for k in absc: + v = absc[k] + c, _ = k + if len(v) > 1: + e = Add(*v, evaluate=False) + new = do(e) + if new != e: + e = new + hit = True + args.append(c*e) + else: + args.append(c*v[0]) + if hit: + rv = Add(*args) + + return rv + + +fufuncs = ''' + TR0 TR1 TR2 TR3 TR4 TR5 TR6 TR7 TR8 TR9 TR10 TR10i TR11 + TR12 TR13 L TR2i TRmorrie TR12i + TR14 TR15 TR16 TR111 TR22'''.split() +FU = dict(list(zip(fufuncs, list(map(locals().get, fufuncs))))) + + +@cacheit +def _ROOT2(): + return sqrt(2) + + +@cacheit +def _ROOT3(): + return sqrt(3) + + +@cacheit +def _invROOT3(): + return 1/sqrt(3) + + +def trig_split(a, b, two=False): + """Return the gcd, s1, s2, a1, a2, bool where + + If two is False (default) then:: + a + b = gcd*(s1*f(a1) + s2*f(a2)) where f = cos if bool else sin + else: + if bool, a + b was +/- cos(a1)*cos(a2) +/- sin(a1)*sin(a2) and equals + n1*gcd*cos(a - b) if n1 == n2 else + n1*gcd*cos(a + b) + else a + b was +/- cos(a1)*sin(a2) +/- sin(a1)*cos(a2) and equals + n1*gcd*sin(a + b) if n1 = n2 else + n1*gcd*sin(b - a) + + Examples + ======== + + >>> from sympy.simplify.fu import trig_split + >>> from sympy.abc import x, y, z + >>> from sympy import cos, sin, sqrt + + >>> trig_split(cos(x), cos(y)) + (1, 1, 1, x, y, True) + >>> trig_split(2*cos(x), -2*cos(y)) + (2, 1, -1, x, y, True) + >>> trig_split(cos(x)*sin(y), cos(y)*sin(y)) + (sin(y), 1, 1, x, y, True) + + >>> trig_split(cos(x), -sqrt(3)*sin(x), two=True) + (2, 1, -1, x, pi/6, False) + >>> trig_split(cos(x), sin(x), two=True) + (sqrt(2), 1, 1, x, pi/4, False) + >>> trig_split(cos(x), -sin(x), two=True) + (sqrt(2), 1, -1, x, pi/4, False) + >>> trig_split(sqrt(2)*cos(x), -sqrt(6)*sin(x), two=True) + (2*sqrt(2), 1, -1, x, pi/6, False) + >>> trig_split(-sqrt(6)*cos(x), -sqrt(2)*sin(x), two=True) + (-2*sqrt(2), 1, 1, x, pi/3, False) + >>> trig_split(cos(x)/sqrt(6), sin(x)/sqrt(2), two=True) + (sqrt(6)/3, 1, 1, x, pi/6, False) + >>> trig_split(-sqrt(6)*cos(x)*sin(y), -sqrt(2)*sin(x)*sin(y), two=True) + (-2*sqrt(2)*sin(y), 1, 1, x, pi/3, False) + + >>> trig_split(cos(x), sin(x)) + >>> trig_split(cos(x), sin(z)) + >>> trig_split(2*cos(x), -sin(x)) + >>> trig_split(cos(x), -sqrt(3)*sin(x)) + >>> trig_split(cos(x)*cos(y), sin(x)*sin(z)) + >>> trig_split(cos(x)*cos(y), sin(x)*sin(y)) + >>> trig_split(-sqrt(6)*cos(x), sqrt(2)*sin(x)*sin(y), two=True) + """ + a, b = [Factors(i) for i in (a, b)] + ua, ub = a.normal(b) + gcd = a.gcd(b).as_expr() + n1 = n2 = 1 + if S.NegativeOne in ua.factors: + ua = ua.quo(S.NegativeOne) + n1 = -n1 + elif S.NegativeOne in ub.factors: + ub = ub.quo(S.NegativeOne) + n2 = -n2 + a, b = [i.as_expr() for i in (ua, ub)] + + def pow_cos_sin(a, two): + """Return ``a`` as a tuple (r, c, s) such that + ``a = (r or 1)*(c or 1)*(s or 1)``. + + Three arguments are returned (radical, c-factor, s-factor) as + long as the conditions set by ``two`` are met; otherwise None is + returned. If ``two`` is True there will be one or two non-None + values in the tuple: c and s or c and r or s and r or s or c with c + being a cosine function (if possible) else a sine, and s being a sine + function (if possible) else oosine. If ``two`` is False then there + will only be a c or s term in the tuple. + + ``two`` also require that either two cos and/or sin be present (with + the condition that if the functions are the same the arguments are + different or vice versa) or that a single cosine or a single sine + be present with an optional radical. + + If the above conditions dictated by ``two`` are not met then None + is returned. + """ + c = s = None + co = S.One + if a.is_Mul: + co, a = a.as_coeff_Mul() + if len(a.args) > 2 or not two: + return None + if a.is_Mul: + args = list(a.args) + else: + args = [a] + a = args.pop(0) + if isinstance(a, cos): + c = a + elif isinstance(a, sin): + s = a + elif a.is_Pow and a.exp is S.Half: # autoeval doesn't allow -1/2 + co *= a + else: + return None + if args: + b = args[0] + if isinstance(b, cos): + if c: + s = b + else: + c = b + elif isinstance(b, sin): + if s: + c = b + else: + s = b + elif b.is_Pow and b.exp is S.Half: + co *= b + else: + return None + return co if co is not S.One else None, c, s + elif isinstance(a, cos): + c = a + elif isinstance(a, sin): + s = a + if c is None and s is None: + return + co = co if co is not S.One else None + return co, c, s + + # get the parts + m = pow_cos_sin(a, two) + if m is None: + return + coa, ca, sa = m + m = pow_cos_sin(b, two) + if m is None: + return + cob, cb, sb = m + + # check them + if (not ca) and cb or ca and isinstance(ca, sin): + coa, ca, sa, cob, cb, sb = cob, cb, sb, coa, ca, sa + n1, n2 = n2, n1 + if not two: # need cos(x) and cos(y) or sin(x) and sin(y) + c = ca or sa + s = cb or sb + if not isinstance(c, s.func): + return None + return gcd, n1, n2, c.args[0], s.args[0], isinstance(c, cos) + else: + if not coa and not cob: + if (ca and cb and sa and sb): + if isinstance(ca, sa.func) is not isinstance(cb, sb.func): + return + args = {j.args for j in (ca, sa)} + if not all(i.args in args for i in (cb, sb)): + return + return gcd, n1, n2, ca.args[0], sa.args[0], isinstance(ca, sa.func) + if ca and sa or cb and sb or \ + two and (ca is None and sa is None or cb is None and sb is None): + return + c = ca or sa + s = cb or sb + if c.args != s.args: + return + if not coa: + coa = S.One + if not cob: + cob = S.One + if coa is cob: + gcd *= _ROOT2() + return gcd, n1, n2, c.args[0], pi/4, False + elif coa/cob == _ROOT3(): + gcd *= 2*cob + return gcd, n1, n2, c.args[0], pi/3, False + elif coa/cob == _invROOT3(): + gcd *= 2*coa + return gcd, n1, n2, c.args[0], pi/6, False + + +def as_f_sign_1(e): + """If ``e`` is a sum that can be written as ``g*(a + s)`` where + ``s`` is ``+/-1``, return ``g``, ``a``, and ``s`` where ``a`` does + not have a leading negative coefficient. + + Examples + ======== + + >>> from sympy.simplify.fu import as_f_sign_1 + >>> from sympy.abc import x + >>> as_f_sign_1(x + 1) + (1, x, 1) + >>> as_f_sign_1(x - 1) + (1, x, -1) + >>> as_f_sign_1(-x + 1) + (-1, x, -1) + >>> as_f_sign_1(-x - 1) + (-1, x, 1) + >>> as_f_sign_1(2*x + 2) + (2, x, 1) + """ + if not e.is_Add or len(e.args) != 2: + return + # exact match + a, b = e.args + if a in (S.NegativeOne, S.One): + g = S.One + if b.is_Mul and b.args[0].is_Number and b.args[0] < 0: + a, b = -a, -b + g = -g + return g, b, a + # gcd match + a, b = [Factors(i) for i in e.args] + ua, ub = a.normal(b) + gcd = a.gcd(b).as_expr() + if S.NegativeOne in ua.factors: + ua = ua.quo(S.NegativeOne) + n1 = -1 + n2 = 1 + elif S.NegativeOne in ub.factors: + ub = ub.quo(S.NegativeOne) + n1 = 1 + n2 = -1 + else: + n1 = n2 = 1 + a, b = [i.as_expr() for i in (ua, ub)] + if a is S.One: + a, b = b, a + n1, n2 = n2, n1 + if n1 == -1: + gcd = -gcd + n2 = -n2 + + if b is S.One: + return gcd, a, n2 + + +def _osborne(e, d): + """Replace all hyperbolic functions with trig functions using + the Osborne rule. + + Notes + ===== + + ``d`` is a dummy variable to prevent automatic evaluation + of trigonometric/hyperbolic functions. + + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hyperbolic_function + """ + + def f(rv): + if not isinstance(rv, HyperbolicFunction): + return rv + a = rv.args[0] + a = a*d if not a.is_Add else Add._from_args([i*d for i in a.args]) + if isinstance(rv, sinh): + return I*sin(a) + elif isinstance(rv, cosh): + return cos(a) + elif isinstance(rv, tanh): + return I*tan(a) + elif isinstance(rv, coth): + return cot(a)/I + elif isinstance(rv, sech): + return sec(a) + elif isinstance(rv, csch): + return csc(a)/I + else: + raise NotImplementedError('unhandled %s' % rv.func) + + return bottom_up(e, f) + + +def _osbornei(e, d): + """Replace all trig functions with hyperbolic functions using + the Osborne rule. + + Notes + ===== + + ``d`` is a dummy variable to prevent automatic evaluation + of trigonometric/hyperbolic functions. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hyperbolic_function + """ + + def f(rv): + if not isinstance(rv, TrigonometricFunction): + return rv + const, x = rv.args[0].as_independent(d, as_Add=True) + a = x.xreplace({d: S.One}) + const*I + if isinstance(rv, sin): + return sinh(a)/I + elif isinstance(rv, cos): + return cosh(a) + elif isinstance(rv, tan): + return tanh(a)/I + elif isinstance(rv, cot): + return coth(a)*I + elif isinstance(rv, sec): + return sech(a) + elif isinstance(rv, csc): + return csch(a)*I + else: + raise NotImplementedError('unhandled %s' % rv.func) + + return bottom_up(e, f) + + +def hyper_as_trig(rv): + """Return an expression containing hyperbolic functions in terms + of trigonometric functions. Any trigonometric functions initially + present are replaced with Dummy symbols and the function to undo + the masking and the conversion back to hyperbolics is also returned. It + should always be true that:: + + t, f = hyper_as_trig(expr) + expr == f(t) + + Examples + ======== + + >>> from sympy.simplify.fu import hyper_as_trig, fu + >>> from sympy.abc import x + >>> from sympy import cosh, sinh + >>> eq = sinh(x)**2 + cosh(x)**2 + >>> t, f = hyper_as_trig(eq) + >>> f(fu(t)) + cosh(2*x) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hyperbolic_function + """ + from sympy.simplify.simplify import signsimp + from sympy.simplify.radsimp import collect + + # mask off trig functions + trigs = rv.atoms(TrigonometricFunction) + reps = [(t, Dummy()) for t in trigs] + masked = rv.xreplace(dict(reps)) + + # get inversion substitutions in place + reps = [(v, k) for k, v in reps] + + d = Dummy() + + return _osborne(masked, d), lambda x: collect(signsimp( + _osbornei(x, d).xreplace(dict(reps))), S.ImaginaryUnit) + + +def sincos_to_sum(expr): + """Convert products and powers of sin and cos to sums. + + Explanation + =========== + + Applied power reduction TRpower first, then expands products, and + converts products to sums with TR8. + + Examples + ======== + + >>> from sympy.simplify.fu import sincos_to_sum + >>> from sympy.abc import x + >>> from sympy import cos, sin + >>> sincos_to_sum(16*sin(x)**3*cos(2*x)**2) + 7*sin(x) - 5*sin(3*x) + 3*sin(5*x) - sin(7*x) + """ + + if not expr.has(cos, sin): + return expr + else: + return TR8(expand_mul(TRpower(expr))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/gammasimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/gammasimp.py new file mode 100644 index 0000000000000000000000000000000000000000..aec20c56eb60efb8e1aadfb5bff3d1ba1ab51869 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/gammasimp.py @@ -0,0 +1,493 @@ +from sympy.core import Function, S, Mul, Pow, Add +from sympy.core.sorting import ordered, default_sort_key +from sympy.core.function import expand_func +from sympy.core.symbol import Dummy +from sympy.functions import gamma, sqrt, sin +from sympy.polys import factor, cancel +from sympy.utilities.iterables import sift, uniq + + +def gammasimp(expr): + r""" + Simplify expressions with gamma functions. + + Explanation + =========== + + This function takes as input an expression containing gamma + functions or functions that can be rewritten in terms of gamma + functions and tries to minimize the number of those functions and + reduce the size of their arguments. + + The algorithm works by rewriting all gamma functions as expressions + involving rising factorials (Pochhammer symbols) and applies + recurrence relations and other transformations applicable to rising + factorials, to reduce their arguments, possibly letting the resulting + rising factorial to cancel. Rising factorials with the second argument + being an integer are expanded into polynomial forms and finally all + other rising factorial are rewritten in terms of gamma functions. + + Then the following two steps are performed. + + 1. Reduce the number of gammas by applying the reflection theorem + gamma(x)*gamma(1-x) == pi/sin(pi*x). + 2. Reduce the number of gammas by applying the multiplication theorem + gamma(x)*gamma(x+1/n)*...*gamma(x+(n-1)/n) == C*gamma(n*x). + + It then reduces the number of prefactors by absorbing them into gammas + where possible and expands gammas with rational argument. + + All transformation rules can be found (or were derived from) here: + + .. [1] https://functions.wolfram.com/GammaBetaErf/Pochhammer/17/01/02/ + .. [2] https://functions.wolfram.com/GammaBetaErf/Pochhammer/27/01/0005/ + + Examples + ======== + + >>> from sympy.simplify import gammasimp + >>> from sympy import gamma, Symbol + >>> from sympy.abc import x + >>> n = Symbol('n', integer = True) + + >>> gammasimp(gamma(x)/gamma(x - 3)) + (x - 3)*(x - 2)*(x - 1) + >>> gammasimp(gamma(n + 3)) + gamma(n + 3) + + """ + + expr = expr.rewrite(gamma) + + # compute_ST will be looking for Functions and we don't want + # it looking for non-gamma functions: issue 22606 + # so we mask free, non-gamma functions + f = expr.atoms(Function) + # take out gammas + gammas = {i for i in f if isinstance(i, gamma)} + if not gammas: + return expr # avoid side effects like factoring + f -= gammas + # keep only those without bound symbols + f = f & expr.as_dummy().atoms(Function) + if f: + dum, fun, simp = zip(*[ + (Dummy(), fi, fi.func(*[ + _gammasimp(a, as_comb=False) for a in fi.args])) + for fi in ordered(f)]) + d = expr.xreplace(dict(zip(fun, dum))) + return _gammasimp(d, as_comb=False).xreplace(dict(zip(dum, simp))) + + return _gammasimp(expr, as_comb=False) + + +def _gammasimp(expr, as_comb): + """ + Helper function for gammasimp and combsimp. + + Explanation + =========== + + Simplifies expressions written in terms of gamma function. If + as_comb is True, it tries to preserve integer arguments. See + docstring of gammasimp for more information. This was part of + combsimp() in combsimp.py. + """ + expr = expr.replace(gamma, + lambda n: _rf(1, (n - 1).expand())) + + if as_comb: + expr = expr.replace(_rf, + lambda a, b: gamma(b + 1)) + else: + expr = expr.replace(_rf, + lambda a, b: gamma(a + b)/gamma(a)) + + def rule_gamma(expr, level=0): + """ Simplify products of gamma functions further. """ + + if expr.is_Atom: + return expr + + def gamma_rat(x): + # helper to simplify ratios of gammas + was = x.count(gamma) + xx = x.replace(gamma, lambda n: _rf(1, (n - 1).expand() + ).replace(_rf, lambda a, b: gamma(a + b)/gamma(a))) + if xx.count(gamma) < was: + x = xx + return x + + def gamma_factor(x): + # return True if there is a gamma factor in shallow args + if isinstance(x, gamma): + return True + if x.is_Add or x.is_Mul: + return any(gamma_factor(xi) for xi in x.args) + if x.is_Pow and (x.exp.is_integer or x.base.is_positive): + return gamma_factor(x.base) + return False + + # recursion step + if level == 0: + expr = expr.func(*[rule_gamma(x, level + 1) for x in expr.args]) + level += 1 + + if not expr.is_Mul: + return expr + + # non-commutative step + if level == 1: + args, nc = expr.args_cnc() + if not args: + return expr + if nc: + return rule_gamma(Mul._from_args(args), level + 1)*Mul._from_args(nc) + level += 1 + + # pure gamma handling, not factor absorption + if level == 2: + T, F = sift(expr.args, gamma_factor, binary=True) + gamma_ind = Mul(*F) + d = Mul(*T) + + nd, dd = d.as_numer_denom() + for ipass in range(2): + args = list(ordered(Mul.make_args(nd))) + for i, ni in enumerate(args): + if ni.is_Add: + ni, dd = Add(*[ + rule_gamma(gamma_rat(a/dd), level + 1) for a in ni.args] + ).as_numer_denom() + args[i] = ni + if not dd.has(gamma): + break + nd = Mul(*args) + if ipass == 0 and not gamma_factor(nd): + break + nd, dd = dd, nd # now process in reversed order + expr = gamma_ind*nd/dd + if not (expr.is_Mul and (gamma_factor(dd) or gamma_factor(nd))): + return expr + level += 1 + + # iteration until constant + if level == 3: + while True: + was = expr + expr = rule_gamma(expr, 4) + if expr == was: + return expr + + numer_gammas = [] + denom_gammas = [] + numer_others = [] + denom_others = [] + def explicate(p): + if p is S.One: + return None, [] + b, e = p.as_base_exp() + if e.is_Integer: + if isinstance(b, gamma): + return True, [b.args[0]]*e + else: + return False, [b]*e + else: + return False, [p] + + newargs = list(ordered(expr.args)) + while newargs: + n, d = newargs.pop().as_numer_denom() + isg, l = explicate(n) + if isg: + numer_gammas.extend(l) + elif isg is False: + numer_others.extend(l) + isg, l = explicate(d) + if isg: + denom_gammas.extend(l) + elif isg is False: + denom_others.extend(l) + + # =========== level 2 work: pure gamma manipulation ========= + + if not as_comb: + # Try to reduce the number of gamma factors by applying the + # reflection formula gamma(x)*gamma(1-x) = pi/sin(pi*x) + for gammas, numer, denom in [( + numer_gammas, numer_others, denom_others), + (denom_gammas, denom_others, numer_others)]: + new = [] + while gammas: + g1 = gammas.pop() + if g1.is_integer: + new.append(g1) + continue + for i, g2 in enumerate(gammas): + n = g1 + g2 - 1 + if not n.is_Integer: + continue + numer.append(S.Pi) + denom.append(sin(S.Pi*g1)) + gammas.pop(i) + if n > 0: + numer.extend(1 - g1 + k for k in range(n)) + elif n < 0: + denom.extend(-g1 - k for k in range(-n)) + break + else: + new.append(g1) + # /!\ updating IN PLACE + gammas[:] = new + + # Try to reduce the number of gammas by using the duplication + # theorem to cancel an upper and lower: gamma(2*s)/gamma(s) = + # 2**(2*s + 1)/(4*sqrt(pi))*gamma(s + 1/2). Although this could + # be done with higher argument ratios like gamma(3*x)/gamma(x), + # this would not reduce the number of gammas as in this case. + for ng, dg, no, do in [(numer_gammas, denom_gammas, numer_others, + denom_others), + (denom_gammas, numer_gammas, denom_others, + numer_others)]: + + while True: + for x in ng: + for y in dg: + n = x - 2*y + if n.is_Integer: + break + else: + continue + break + else: + break + ng.remove(x) + dg.remove(y) + if n > 0: + no.extend(2*y + k for k in range(n)) + elif n < 0: + do.extend(2*y - 1 - k for k in range(-n)) + ng.append(y + S.Half) + no.append(2**(2*y - 1)) + do.append(sqrt(S.Pi)) + + # Try to reduce the number of gamma factors by applying the + # multiplication theorem (used when n gammas with args differing + # by 1/n mod 1 are encountered). + # + # run of 2 with args differing by 1/2 + # + # >>> gammasimp(gamma(x)*gamma(x+S.Half)) + # 2*sqrt(2)*2**(-2*x - 1/2)*sqrt(pi)*gamma(2*x) + # + # run of 3 args differing by 1/3 (mod 1) + # + # >>> gammasimp(gamma(x)*gamma(x+S(1)/3)*gamma(x+S(2)/3)) + # 6*3**(-3*x - 1/2)*pi*gamma(3*x) + # >>> gammasimp(gamma(x)*gamma(x+S(1)/3)*gamma(x+S(5)/3)) + # 2*3**(-3*x - 1/2)*pi*(3*x + 2)*gamma(3*x) + # + def _run(coeffs): + # find runs in coeffs such that the difference in terms (mod 1) + # of t1, t2, ..., tn is 1/n + u = list(uniq(coeffs)) + for i in range(len(u)): + dj = ([((u[j] - u[i]) % 1, j) for j in range(i + 1, len(u))]) + for one, j in dj: + if one.p == 1 and one.q != 1: + n = one.q + got = [i] + get = list(range(1, n)) + for d, j in dj: + m = n*d + if m.is_Integer and m in get: + get.remove(m) + got.append(j) + if not get: + break + else: + continue + for i, j in enumerate(got): + c = u[j] + coeffs.remove(c) + got[i] = c + return one.q, got[0], got[1:] + + def _mult_thm(gammas, numer, denom): + # pull off and analyze the leading coefficient from each gamma arg + # looking for runs in those Rationals + + # expr -> coeff + resid -> rats[resid] = coeff + rats = {} + for g in gammas: + c, resid = g.as_coeff_Add() + rats.setdefault(resid, []).append(c) + + # look for runs in Rationals for each resid + keys = sorted(rats, key=default_sort_key) + for resid in keys: + coeffs = sorted(rats[resid]) + new = [] + while True: + run = _run(coeffs) + if run is None: + break + + # process the sequence that was found: + # 1) convert all the gamma functions to have the right + # argument (could be off by an integer) + # 2) append the factors corresponding to the theorem + # 3) append the new gamma function + + n, ui, other = run + + # (1) + for u in other: + con = resid + u - 1 + for k in range(int(u - ui)): + numer.append(con - k) + + con = n*(resid + ui) # for (2) and (3) + + # (2) + numer.append((2*S.Pi)**(S(n - 1)/2)* + n**(S.Half - con)) + # (3) + new.append(con) + + # restore resid to coeffs + rats[resid] = [resid + c for c in coeffs] + new + + # rebuild the gamma arguments + g = [] + for resid in keys: + g += rats[resid] + # /!\ updating IN PLACE + gammas[:] = g + + for l, numer, denom in [(numer_gammas, numer_others, denom_others), + (denom_gammas, denom_others, numer_others)]: + _mult_thm(l, numer, denom) + + # =========== level >= 2 work: factor absorption ========= + + if level >= 2: + # Try to absorb factors into the gammas: x*gamma(x) -> gamma(x + 1) + # and gamma(x)/(x - 1) -> gamma(x - 1) + # This code (in particular repeated calls to find_fuzzy) can be very + # slow. + def find_fuzzy(l, x): + if not l: + return + S1, T1 = compute_ST(x) + for y in l: + S2, T2 = inv[y] + if T1 != T2 or (not S1.intersection(S2) and + (S1 != set() or S2 != set())): + continue + # XXX we want some simplification (e.g. cancel or + # simplify) but no matter what it's slow. + a = len(cancel(x/y).free_symbols) + b = len(x.free_symbols) + c = len(y.free_symbols) + # TODO is there a better heuristic? + if a == 0 and (b > 0 or c > 0): + return y + + # We thus try to avoid expensive calls by building the following + # "invariants": For every factor or gamma function argument + # - the set of free symbols S + # - the set of functional components T + # We will only try to absorb if T1==T2 and (S1 intersect S2 != emptyset + # or S1 == S2 == emptyset) + inv = {} + + def compute_ST(expr): + if expr in inv: + return inv[expr] + return (expr.free_symbols, expr.atoms(Function).union( + {e.exp for e in expr.atoms(Pow)})) + + def update_ST(expr): + inv[expr] = compute_ST(expr) + for expr in numer_gammas + denom_gammas + numer_others + denom_others: + update_ST(expr) + + for gammas, numer, denom in [( + numer_gammas, numer_others, denom_others), + (denom_gammas, denom_others, numer_others)]: + new = [] + while gammas: + g = gammas.pop() + cont = True + while cont: + cont = False + y = find_fuzzy(numer, g) + if y is not None: + numer.remove(y) + if y != g: + numer.append(y/g) + update_ST(y/g) + g += 1 + cont = True + y = find_fuzzy(denom, g - 1) + if y is not None: + denom.remove(y) + if y != g - 1: + numer.append((g - 1)/y) + update_ST((g - 1)/y) + g -= 1 + cont = True + new.append(g) + # /!\ updating IN PLACE + gammas[:] = new + + # =========== rebuild expr ================================== + + return Mul(*[gamma(g) for g in numer_gammas]) \ + / Mul(*[gamma(g) for g in denom_gammas]) \ + * Mul(*numer_others) / Mul(*denom_others) + + was = factor(expr) + # (for some reason we cannot use Basic.replace in this case) + expr = rule_gamma(was) + if expr != was: + expr = factor(expr) + + expr = expr.replace(gamma, + lambda n: expand_func(gamma(n)) if n.is_Rational else gamma(n)) + + return expr + + +class _rf(Function): + @classmethod + def eval(cls, a, b): + if b.is_Integer: + if not b: + return S.One + + n = int(b) + + if n > 0: + return Mul(*[a + i for i in range(n)]) + elif n < 0: + return 1/Mul(*[a - i for i in range(1, -n + 1)]) + else: + if b.is_Add: + c, _b = b.as_coeff_Add() + + if c.is_Integer: + if c > 0: + return _rf(a, _b)*_rf(a + _b, c) + elif c < 0: + return _rf(a, _b)/_rf(a + _b + c, -c) + + if a.is_Add: + c, _a = a.as_coeff_Add() + + if c.is_Integer: + if c > 0: + return _rf(_a, b)*_rf(_a + b, c)/_rf(_a, c) + elif c < 0: + return _rf(_a, b)*_rf(_a + c, -c)/_rf(_a + b + c, -c) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand.py new file mode 100644 index 0000000000000000000000000000000000000000..c070aa2e44b92794107b3e33df897813a54307b9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand.py @@ -0,0 +1,2494 @@ +""" +Expand Hypergeometric (and Meijer G) functions into named +special functions. + +The algorithm for doing this uses a collection of lookup tables of +hypergeometric functions, and various of their properties, to expand +many hypergeometric functions in terms of special functions. + +It is based on the following paper: + Kelly B. Roach. Meijer G Function Representations. + In: Proceedings of the 1997 International Symposium on Symbolic and + Algebraic Computation, pages 205-211, New York, 1997. ACM. + +It is described in great(er) detail in the Sphinx documentation. +""" +# SUMMARY OF EXTENSIONS FOR MEIJER G FUNCTIONS +# +# o z**rho G(ap, bq; z) = G(ap + rho, bq + rho; z) +# +# o denote z*d/dz by D +# +# o It is helpful to keep in mind that ap and bq play essentially symmetric +# roles: G(1/z) has slightly altered parameters, with ap and bq interchanged. +# +# o There are four shift operators: +# A_J = b_J - D, J = 1, ..., n +# B_J = 1 - a_j + D, J = 1, ..., m +# C_J = -b_J + D, J = m+1, ..., q +# D_J = a_J - 1 - D, J = n+1, ..., p +# +# A_J, C_J increment b_J +# B_J, D_J decrement a_J +# +# o The corresponding four inverse-shift operators are defined if there +# is no cancellation. Thus e.g. an index a_J (upper or lower) can be +# incremented if a_J != b_i for i = 1, ..., q. +# +# o Order reduction: if b_j - a_i is a non-negative integer, where +# j <= m and i > n, the corresponding quotient of gamma functions reduces +# to a polynomial. Hence the G function can be expressed using a G-function +# of lower order. +# Similarly if j > m and i <= n. +# +# Secondly, there are paired index theorems [Adamchik, The evaluation of +# integrals of Bessel functions via G-function identities]. Suppose there +# are three parameters a, b, c, where a is an a_i, i <= n, b is a b_j, +# j <= m and c is a denominator parameter (i.e. a_i, i > n or b_j, j > m). +# Suppose further all three differ by integers. +# Then the order can be reduced. +# TODO work this out in detail. +# +# o An index quadruple is called suitable if its order cannot be reduced. +# If there exists a sequence of shift operators transforming one index +# quadruple into another, we say one is reachable from the other. +# +# o Deciding if one index quadruple is reachable from another is tricky. For +# this reason, we use hand-built routines to match and instantiate formulas. +# +from collections import defaultdict +from itertools import product +from functools import reduce +from math import prod + +from sympy import SYMPY_DEBUG +from sympy.core import (S, Dummy, symbols, sympify, Tuple, expand, I, pi, Mul, + EulerGamma, oo, zoo, expand_func, Add, nan, Expr, Rational) +from sympy.core.mod import Mod +from sympy.core.sorting import default_sort_key +from sympy.functions import (exp, sqrt, root, log, lowergamma, cos, + besseli, gamma, uppergamma, expint, erf, sin, besselj, Ei, Ci, Si, Shi, + sinh, cosh, Chi, fresnels, fresnelc, polar_lift, exp_polar, floor, ceiling, + rf, factorial, lerchphi, Piecewise, re, elliptic_k, elliptic_e) +from sympy.functions.elementary.complexes import polarify, unpolarify +from sympy.functions.special.hyper import (hyper, HyperRep_atanh, + HyperRep_power1, HyperRep_power2, HyperRep_log1, HyperRep_asin1, + HyperRep_asin2, HyperRep_sqrts1, HyperRep_sqrts2, HyperRep_log2, + HyperRep_cosasin, HyperRep_sinasin, meijerg) +from sympy.matrices import Matrix, eye, zeros +from sympy.polys import apart, poly, Poly +from sympy.series import residue +from sympy.simplify.powsimp import powdenest +from sympy.utilities.iterables import sift + +# function to define "buckets" +def _mod1(x): + # TODO see if this can work as Mod(x, 1); this will require + # different handling of the "buckets" since these need to + # be sorted and that fails when there is a mixture of + # integers and expressions with parameters. With the current + # Mod behavior, Mod(k, 1) == Mod(1, 1) == 0 if k is an integer. + # Although the sorting can be done with Basic.compare, this may + # still require different handling of the sorted buckets. + if x.is_Number: + return Mod(x, 1) + c, x = x.as_coeff_Add() + return Mod(c, 1) + x + + +# leave add formulae at the top for easy reference +def add_formulae(formulae): + """ Create our knowledge base. """ + a, b, c, z = symbols('a b c, z', cls=Dummy) + + def add(ap, bq, res): + func = Hyper_Function(ap, bq) + formulae.append(Formula(func, z, res, (a, b, c))) + + def addb(ap, bq, B, C, M): + func = Hyper_Function(ap, bq) + formulae.append(Formula(func, z, None, (a, b, c), B, C, M)) + + # Luke, Y. L. (1969), The Special Functions and Their Approximations, + # Volume 1, section 6.2 + + # 0F0 + add((), (), exp(z)) + + # 1F0 + add((a, ), (), HyperRep_power1(-a, z)) + + # 2F1 + addb((a, a - S.Half), (2*a, ), + Matrix([HyperRep_power2(a, z), + HyperRep_power2(a + S.Half, z)/2]), + Matrix([[1, 0]]), + Matrix([[(a - S.Half)*z/(1 - z), (S.Half - a)*z/(1 - z)], + [a/(1 - z), a*(z - 2)/(1 - z)]])) + addb((1, 1), (2, ), + Matrix([HyperRep_log1(z), 1]), Matrix([[-1/z, 0]]), + Matrix([[0, z/(z - 1)], [0, 0]])) + addb((S.Half, 1), (S('3/2'), ), + Matrix([HyperRep_atanh(z), 1]), + Matrix([[1, 0]]), + Matrix([[Rational(-1, 2), 1/(1 - z)/2], [0, 0]])) + addb((S.Half, S.Half), (S('3/2'), ), + Matrix([HyperRep_asin1(z), HyperRep_power1(Rational(-1, 2), z)]), + Matrix([[1, 0]]), + Matrix([[Rational(-1, 2), S.Half], [0, z/(1 - z)/2]])) + addb((a, S.Half + a), (S.Half, ), + Matrix([HyperRep_sqrts1(-a, z), -HyperRep_sqrts2(-a - S.Half, z)]), + Matrix([[1, 0]]), + Matrix([[0, -a], + [z*(-2*a - 1)/2/(1 - z), S.Half - z*(-2*a - 1)/(1 - z)]])) + + # A. P. Prudnikov, Yu. A. Brychkov and O. I. Marichev (1990). + # Integrals and Series: More Special Functions, Vol. 3,. + # Gordon and Breach Science Publisher + addb([a, -a], [S.Half], + Matrix([HyperRep_cosasin(a, z), HyperRep_sinasin(a, z)]), + Matrix([[1, 0]]), + Matrix([[0, -a], [a*z/(1 - z), 1/(1 - z)/2]])) + addb([1, 1], [3*S.Half], + Matrix([HyperRep_asin2(z), 1]), Matrix([[1, 0]]), + Matrix([[(z - S.Half)/(1 - z), 1/(1 - z)/2], [0, 0]])) + + # Complete elliptic integrals K(z) and E(z), both a 2F1 function + addb([S.Half, S.Half], [S.One], + Matrix([elliptic_k(z), elliptic_e(z)]), + Matrix([[2/pi, 0]]), + Matrix([[Rational(-1, 2), -1/(2*z-2)], + [Rational(-1, 2), S.Half]])) + addb([Rational(-1, 2), S.Half], [S.One], + Matrix([elliptic_k(z), elliptic_e(z)]), + Matrix([[0, 2/pi]]), + Matrix([[Rational(-1, 2), -1/(2*z-2)], + [Rational(-1, 2), S.Half]])) + + # 3F2 + addb([Rational(-1, 2), 1, 1], [S.Half, 2], + Matrix([z*HyperRep_atanh(z), HyperRep_log1(z), 1]), + Matrix([[Rational(-2, 3), -S.One/(3*z), Rational(2, 3)]]), + Matrix([[S.Half, 0, z/(1 - z)/2], + [0, 0, z/(z - 1)], + [0, 0, 0]])) + # actually the formula for 3/2 is much nicer ... + addb([Rational(-1, 2), 1, 1], [2, 2], + Matrix([HyperRep_power1(S.Half, z), HyperRep_log2(z), 1]), + Matrix([[Rational(4, 9) - 16/(9*z), 4/(3*z), 16/(9*z)]]), + Matrix([[z/2/(z - 1), 0, 0], [1/(2*(z - 1)), 0, S.Half], [0, 0, 0]])) + + # 1F1 + addb([1], [b], Matrix([z**(1 - b) * exp(z) * lowergamma(b - 1, z), 1]), + Matrix([[b - 1, 0]]), Matrix([[1 - b + z, 1], [0, 0]])) + addb([a], [2*a], + Matrix([z**(S.Half - a)*exp(z/2)*besseli(a - S.Half, z/2) + * gamma(a + S.Half)/4**(S.Half - a), + z**(S.Half - a)*exp(z/2)*besseli(a + S.Half, z/2) + * gamma(a + S.Half)/4**(S.Half - a)]), + Matrix([[1, 0]]), + Matrix([[z/2, z/2], [z/2, (z/2 - 2*a)]])) + mz = polar_lift(-1)*z + addb([a], [a + 1], + Matrix([mz**(-a)*a*lowergamma(a, mz), a*exp(z)]), + Matrix([[1, 0]]), + Matrix([[-a, 1], [0, z]])) + # This one is redundant. + add([Rational(-1, 2)], [S.Half], exp(z) - sqrt(pi*z)*(-I)*erf(I*sqrt(z))) + + # Added to get nice results for Laplace transform of Fresnel functions + # https://functions.wolfram.com/07.22.03.6437.01 + # Basic rule + #add([1], [Rational(3, 4), Rational(5, 4)], + # sqrt(pi) * (cos(2*sqrt(polar_lift(-1)*z))*fresnelc(2*root(polar_lift(-1)*z,4)/sqrt(pi)) + + # sin(2*sqrt(polar_lift(-1)*z))*fresnels(2*root(polar_lift(-1)*z,4)/sqrt(pi))) + # / (2*root(polar_lift(-1)*z,4))) + # Manually tuned rule + addb([1], [Rational(3, 4), Rational(5, 4)], + Matrix([ sqrt(pi)*(I*sinh(2*sqrt(z))*fresnels(2*root(z, 4)*exp(I*pi/4)/sqrt(pi)) + + cosh(2*sqrt(z))*fresnelc(2*root(z, 4)*exp(I*pi/4)/sqrt(pi))) + * exp(-I*pi/4)/(2*root(z, 4)), + sqrt(pi)*root(z, 4)*(sinh(2*sqrt(z))*fresnelc(2*root(z, 4)*exp(I*pi/4)/sqrt(pi)) + + I*cosh(2*sqrt(z))*fresnels(2*root(z, 4)*exp(I*pi/4)/sqrt(pi))) + *exp(-I*pi/4)/2, + 1 ]), + Matrix([[1, 0, 0]]), + Matrix([[Rational(-1, 4), 1, Rational(1, 4)], + [ z, Rational(1, 4), 0], + [ 0, 0, 0]])) + + # 2F2 + addb([S.Half, a], [Rational(3, 2), a + 1], + Matrix([a/(2*a - 1)*(-I)*sqrt(pi/z)*erf(I*sqrt(z)), + a/(2*a - 1)*(polar_lift(-1)*z)**(-a)* + lowergamma(a, polar_lift(-1)*z), + a/(2*a - 1)*exp(z)]), + Matrix([[1, -1, 0]]), + Matrix([[Rational(-1, 2), 0, 1], [0, -a, 1], [0, 0, z]])) + # We make a "basis" of four functions instead of three, and give EulerGamma + # an extra slot (it could just be a coefficient to 1). The advantage is + # that this way Polys will not see multivariate polynomials (it treats + # EulerGamma as an indeterminate), which is *way* faster. + addb([1, 1], [2, 2], + Matrix([Ei(z) - log(z), exp(z), 1, EulerGamma]), + Matrix([[1/z, 0, 0, -1/z]]), + Matrix([[0, 1, -1, 0], [0, z, 0, 0], [0, 0, 0, 0], [0, 0, 0, 0]])) + + # 0F1 + add((), (S.Half, ), cosh(2*sqrt(z))) + addb([], [b], + Matrix([gamma(b)*z**((1 - b)/2)*besseli(b - 1, 2*sqrt(z)), + gamma(b)*z**(1 - b/2)*besseli(b, 2*sqrt(z))]), + Matrix([[1, 0]]), Matrix([[0, 1], [z, (1 - b)]])) + + # 0F3 + x = 4*z**Rational(1, 4) + + def fp(a, z): + return besseli(a, x) + besselj(a, x) + + def fm(a, z): + return besseli(a, x) - besselj(a, x) + + # TODO branching + addb([], [S.Half, a, a + S.Half], + Matrix([fp(2*a - 1, z), fm(2*a, z)*z**Rational(1, 4), + fm(2*a - 1, z)*sqrt(z), fp(2*a, z)*z**Rational(3, 4)]) + * 2**(-2*a)*gamma(2*a)*z**((1 - 2*a)/4), + Matrix([[1, 0, 0, 0]]), + Matrix([[0, 1, 0, 0], + [0, S.Half - a, 1, 0], + [0, 0, S.Half, 1], + [z, 0, 0, 1 - a]])) + x = 2*(4*z)**Rational(1, 4)*exp_polar(I*pi/4) + addb([], [a, a + S.Half, 2*a], + (2*sqrt(polar_lift(-1)*z))**(1 - 2*a)*gamma(2*a)**2 * + Matrix([besselj(2*a - 1, x)*besseli(2*a - 1, x), + x*(besseli(2*a, x)*besselj(2*a - 1, x) + - besseli(2*a - 1, x)*besselj(2*a, x)), + x**2*besseli(2*a, x)*besselj(2*a, x), + x**3*(besseli(2*a, x)*besselj(2*a - 1, x) + + besseli(2*a - 1, x)*besselj(2*a, x))]), + Matrix([[1, 0, 0, 0]]), + Matrix([[0, Rational(1, 4), 0, 0], + [0, (1 - 2*a)/2, Rational(-1, 2), 0], + [0, 0, 1 - 2*a, Rational(1, 4)], + [-32*z, 0, 0, 1 - a]])) + + # 1F2 + addb([a], [a - S.Half, 2*a], + Matrix([z**(S.Half - a)*besseli(a - S.Half, sqrt(z))**2, + z**(1 - a)*besseli(a - S.Half, sqrt(z)) + *besseli(a - Rational(3, 2), sqrt(z)), + z**(Rational(3, 2) - a)*besseli(a - Rational(3, 2), sqrt(z))**2]), + Matrix([[-gamma(a + S.Half)**2/4**(S.Half - a), + 2*gamma(a - S.Half)*gamma(a + S.Half)/4**(1 - a), + 0]]), + Matrix([[1 - 2*a, 1, 0], [z/2, S.Half - a, S.Half], [0, z, 0]])) + addb([S.Half], [b, 2 - b], + pi*(1 - b)/sin(pi*b)* + Matrix([besseli(1 - b, sqrt(z))*besseli(b - 1, sqrt(z)), + sqrt(z)*(besseli(-b, sqrt(z))*besseli(b - 1, sqrt(z)) + + besseli(1 - b, sqrt(z))*besseli(b, sqrt(z))), + besseli(-b, sqrt(z))*besseli(b, sqrt(z))]), + Matrix([[1, 0, 0]]), + Matrix([[b - 1, S.Half, 0], + [z, 0, z], + [0, S.Half, -b]])) + addb([S.Half], [Rational(3, 2), Rational(3, 2)], + Matrix([Shi(2*sqrt(z))/2/sqrt(z), sinh(2*sqrt(z))/2/sqrt(z), + cosh(2*sqrt(z))]), + Matrix([[1, 0, 0]]), + Matrix([[Rational(-1, 2), S.Half, 0], [0, Rational(-1, 2), S.Half], [0, 2*z, 0]])) + + # FresnelS + # Basic rule + #add([Rational(3, 4)], [Rational(3, 2),Rational(7, 4)], 6*fresnels( exp(pi*I/4)*root(z,4)*2/sqrt(pi) ) / ( pi * (exp(pi*I/4)*root(z,4)*2/sqrt(pi))**3 ) ) + # Manually tuned rule + addb([Rational(3, 4)], [Rational(3, 2), Rational(7, 4)], + Matrix( + [ fresnels( + exp( + pi*I/4)*root( + z, 4)*2/sqrt( + pi) ) / ( + pi * (exp(pi*I/4)*root(z, 4)*2/sqrt(pi))**3 ), + sinh(2*sqrt(z))/sqrt(z), + cosh(2*sqrt(z)) ]), + Matrix([[6, 0, 0]]), + Matrix([[Rational(-3, 4), Rational(1, 16), 0], + [ 0, Rational(-1, 2), 1], + [ 0, z, 0]])) + + # FresnelC + # Basic rule + #add([Rational(1, 4)], [S.Half,Rational(5, 4)], fresnelc( exp(pi*I/4)*root(z,4)*2/sqrt(pi) ) / ( exp(pi*I/4)*root(z,4)*2/sqrt(pi) ) ) + # Manually tuned rule + addb([Rational(1, 4)], [S.Half, Rational(5, 4)], + Matrix( + [ sqrt( + pi)*exp( + -I*pi/4)*fresnelc( + 2*root(z, 4)*exp(I*pi/4)/sqrt(pi))/(2*root(z, 4)), + cosh(2*sqrt(z)), + sinh(2*sqrt(z))*sqrt(z) ]), + Matrix([[1, 0, 0]]), + Matrix([[Rational(-1, 4), Rational(1, 4), 0 ], + [ 0, 0, 1 ], + [ 0, z, S.Half]])) + + # 2F3 + # XXX with this five-parameter formula is pretty slow with the current + # Formula.find_instantiations (creates 2!*3!*3**(2+3) ~ 3000 + # instantiations ... But it's not too bad. + addb([a, a + S.Half], [2*a, b, 2*a - b + 1], + gamma(b)*gamma(2*a - b + 1) * (sqrt(z)/2)**(1 - 2*a) * + Matrix([besseli(b - 1, sqrt(z))*besseli(2*a - b, sqrt(z)), + sqrt(z)*besseli(b, sqrt(z))*besseli(2*a - b, sqrt(z)), + sqrt(z)*besseli(b - 1, sqrt(z))*besseli(2*a - b + 1, sqrt(z)), + besseli(b, sqrt(z))*besseli(2*a - b + 1, sqrt(z))]), + Matrix([[1, 0, 0, 0]]), + Matrix([[0, S.Half, S.Half, 0], + [z/2, 1 - b, 0, z/2], + [z/2, 0, b - 2*a, z/2], + [0, S.Half, S.Half, -2*a]])) + # (C/f above comment about eulergamma in the basis). + addb([1, 1], [2, 2, Rational(3, 2)], + Matrix([Chi(2*sqrt(z)) - log(2*sqrt(z)), + cosh(2*sqrt(z)), sqrt(z)*sinh(2*sqrt(z)), 1, EulerGamma]), + Matrix([[1/z, 0, 0, 0, -1/z]]), + Matrix([[0, S.Half, 0, Rational(-1, 2), 0], + [0, 0, 1, 0, 0], + [0, z, S.Half, 0, 0], + [0, 0, 0, 0, 0], + [0, 0, 0, 0, 0]])) + + # 3F3 + # This is rule: https://functions.wolfram.com/07.31.03.0134.01 + # Initial reason to add it was a nice solution for + # integrate(erf(a*z)/z**2, z) and same for erfc and erfi. + # Basic rule + # add([1, 1, a], [2, 2, a+1], (a/(z*(a-1)**2)) * + # (1 - (-z)**(1-a) * (gamma(a) - uppergamma(a,-z)) + # - (a-1) * (EulerGamma + uppergamma(0,-z) + log(-z)) + # - exp(z))) + # Manually tuned rule + addb([1, 1, a], [2, 2, a+1], + Matrix([a*(log(-z) + expint(1, -z) + EulerGamma)/(z*(a**2 - 2*a + 1)), + a*(-z)**(-a)*(gamma(a) - uppergamma(a, -z))/(a - 1)**2, + a*exp(z)/(a**2 - 2*a + 1), + a/(z*(a**2 - 2*a + 1))]), + Matrix([[1-a, 1, -1/z, 1]]), + Matrix([[-1,0,-1/z,1], + [0,-a,1,0], + [0,0,z,0], + [0,0,0,-1]])) + + +def add_meijerg_formulae(formulae): + a, b, c, z = list(map(Dummy, 'abcz')) + rho = Dummy('rho') + + def add(an, ap, bm, bq, B, C, M, matcher): + formulae.append(MeijerFormula(an, ap, bm, bq, z, [a, b, c, rho], + B, C, M, matcher)) + + def detect_uppergamma(func): + x = func.an[0] + y, z = func.bm + swapped = False + if not _mod1((x - y).simplify()): + swapped = True + (y, z) = (z, y) + if _mod1((x - z).simplify()) or x - z > 0: + return None + l = [y, x] + if swapped: + l = [x, y] + return {rho: y, a: x - y}, G_Function([x], [], l, []) + + add([a + rho], [], [rho, a + rho], [], + Matrix([gamma(1 - a)*z**rho*exp(z)*uppergamma(a, z), + gamma(1 - a)*z**(a + rho)]), + Matrix([[1, 0]]), + Matrix([[rho + z, -1], [0, a + rho]]), + detect_uppergamma) + + def detect_3113(func): + """https://functions.wolfram.com/07.34.03.0984.01""" + x = func.an[0] + u, v, w = func.bm + if _mod1((u - v).simplify()) == 0: + if _mod1((v - w).simplify()) == 0: + return + sig = (S.Half, S.Half, S.Zero) + x1, x2, y = u, v, w + else: + if _mod1((x - u).simplify()) == 0: + sig = (S.Half, S.Zero, S.Half) + x1, y, x2 = u, v, w + else: + sig = (S.Zero, S.Half, S.Half) + y, x1, x2 = u, v, w + + if (_mod1((x - x1).simplify()) != 0 or + _mod1((x - x2).simplify()) != 0 or + _mod1((x - y).simplify()) != S.Half or + x - x1 > 0 or x - x2 > 0): + return + + return {a: x}, G_Function([x], [], [x - S.Half + t for t in sig], []) + + s = sin(2*sqrt(z)) + c_ = cos(2*sqrt(z)) + S_ = Si(2*sqrt(z)) - pi/2 + C = Ci(2*sqrt(z)) + add([a], [], [a, a, a - S.Half], [], + Matrix([sqrt(pi)*z**(a - S.Half)*(c_*S_ - s*C), + sqrt(pi)*z**a*(s*S_ + c_*C), + sqrt(pi)*z**a]), + Matrix([[-2, 0, 0]]), + Matrix([[a - S.Half, -1, 0], [z, a, S.Half], [0, 0, a]]), + detect_3113) + + +def make_simp(z): + """ Create a function that simplifies rational functions in ``z``. """ + + def simp(expr): + """ Efficiently simplify the rational function ``expr``. """ + numer, denom = expr.as_numer_denom() + numer = numer.expand() + # denom = denom.expand() # is this needed? + c, numer, denom = poly(numer, z).cancel(poly(denom, z)) + return c * numer.as_expr() / denom.as_expr() + + return simp + + +def debug(*args): + if SYMPY_DEBUG: + for a in args: + print(a, end="") + print() + + +class Hyper_Function(Expr): + """ A generalized hypergeometric function. """ + + def __new__(cls, ap, bq): + obj = super().__new__(cls) + obj.ap = Tuple(*list(map(expand, ap))) + obj.bq = Tuple(*list(map(expand, bq))) + return obj + + @property + def args(self): + return (self.ap, self.bq) + + @property + def sizes(self): + return (len(self.ap), len(self.bq)) + + @property + def gamma(self): + """ + Number of upper parameters that are negative integers + + This is a transformation invariant. + """ + return sum(bool(x.is_integer and x.is_negative) for x in self.ap) + + def _hashable_content(self): + return super()._hashable_content() + (self.ap, + self.bq) + + def __call__(self, arg): + return hyper(self.ap, self.bq, arg) + + def build_invariants(self): + """ + Compute the invariant vector. + + Explanation + =========== + + The invariant vector is: + (gamma, ((s1, n1), ..., (sk, nk)), ((t1, m1), ..., (tr, mr))) + where gamma is the number of integer a < 0, + s1 < ... < sk + nl is the number of parameters a_i congruent to sl mod 1 + t1 < ... < tr + ml is the number of parameters b_i congruent to tl mod 1 + + If the index pair contains parameters, then this is not truly an + invariant, since the parameters cannot be sorted uniquely mod1. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import Hyper_Function + >>> from sympy import S + >>> ap = (S.Half, S.One/3, S(-1)/2, -2) + >>> bq = (1, 2) + + Here gamma = 1, + k = 3, s1 = 0, s2 = 1/3, s3 = 1/2 + n1 = 1, n2 = 1, n2 = 2 + r = 1, t1 = 0 + m1 = 2: + + >>> Hyper_Function(ap, bq).build_invariants() + (1, ((0, 1), (1/3, 1), (1/2, 2)), ((0, 2),)) + """ + abuckets, bbuckets = sift(self.ap, _mod1), sift(self.bq, _mod1) + + def tr(bucket): + bucket = list(bucket.items()) + if not any(isinstance(x[0], Mod) for x in bucket): + bucket.sort(key=lambda x: default_sort_key(x[0])) + bucket = tuple([(mod, len(values)) for mod, values in bucket if + values]) + return bucket + + return (self.gamma, tr(abuckets), tr(bbuckets)) + + def difficulty(self, func): + """ Estimate how many steps it takes to reach ``func`` from self. + Return -1 if impossible. """ + if self.gamma != func.gamma: + return -1 + oabuckets, obbuckets, abuckets, bbuckets = [sift(params, _mod1) for + params in (self.ap, self.bq, func.ap, func.bq)] + + diff = 0 + for bucket, obucket in [(abuckets, oabuckets), (bbuckets, obbuckets)]: + for mod in set(list(bucket.keys()) + list(obucket.keys())): + if (mod not in bucket) or (mod not in obucket) \ + or len(bucket[mod]) != len(obucket[mod]): + return -1 + l1 = list(bucket[mod]) + l2 = list(obucket[mod]) + l1.sort() + l2.sort() + for i, j in zip(l1, l2): + diff += abs(i - j) + + return diff + + def _is_suitable_origin(self): + """ + Decide if ``self`` is a suitable origin. + + Explanation + =========== + + A function is a suitable origin iff: + * none of the ai equals bj + n, with n a non-negative integer + * none of the ai is zero + * none of the bj is a non-positive integer + + Note that this gives meaningful results only when none of the indices + are symbolic. + + """ + for a in self.ap: + for b in self.bq: + if (a - b).is_integer and (a - b).is_negative is False: + return False + for a in self.ap: + if a == 0: + return False + for b in self.bq: + if b.is_integer and b.is_nonpositive: + return False + return True + + +class G_Function(Expr): + """ A Meijer G-function. """ + + def __new__(cls, an, ap, bm, bq): + obj = super().__new__(cls) + obj.an = Tuple(*list(map(expand, an))) + obj.ap = Tuple(*list(map(expand, ap))) + obj.bm = Tuple(*list(map(expand, bm))) + obj.bq = Tuple(*list(map(expand, bq))) + return obj + + @property + def args(self): + return (self.an, self.ap, self.bm, self.bq) + + def _hashable_content(self): + return super()._hashable_content() + self.args + + def __call__(self, z): + return meijerg(self.an, self.ap, self.bm, self.bq, z) + + def compute_buckets(self): + """ + Compute buckets for the fours sets of parameters. + + Explanation + =========== + + We guarantee that any two equal Mod objects returned are actually the + same, and that the buckets are sorted by real part (an and bq + descendending, bm and ap ascending). + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import G_Function + >>> from sympy.abc import y + >>> from sympy import S + + >>> a, b = [1, 3, 2, S(3)/2], [1 + y, y, 2, y + 3] + >>> G_Function(a, b, [2], [y]).compute_buckets() + ({0: [3, 2, 1], 1/2: [3/2]}, + {0: [2], y: [y, y + 1, y + 3]}, {0: [2]}, {y: [y]}) + + """ + dicts = pan, pap, pbm, pbq = [defaultdict(list) for i in range(4)] + for dic, lis in zip(dicts, (self.an, self.ap, self.bm, self.bq)): + for x in lis: + dic[_mod1(x)].append(x) + + for dic, flip in zip(dicts, (True, False, False, True)): + for m, items in dic.items(): + x0 = items[0] + items.sort(key=lambda x: x - x0, reverse=flip) + dic[m] = items + + return tuple([dict(w) for w in dicts]) + + @property + def signature(self): + return (len(self.an), len(self.ap), len(self.bm), len(self.bq)) + + +# Dummy variable. +_x = Dummy('x') + +class Formula: + """ + This class represents hypergeometric formulae. + + Explanation + =========== + + Its data members are: + - z, the argument + - closed_form, the closed form expression + - symbols, the free symbols (parameters) in the formula + - func, the function + - B, C, M (see _compute_basis) + + Examples + ======== + + >>> from sympy.abc import a, b, z + >>> from sympy.simplify.hyperexpand import Formula, Hyper_Function + >>> func = Hyper_Function((a/2, a/3 + b, (1+a)/2), (a, b, (a+b)/7)) + >>> f = Formula(func, z, None, [a, b]) + + """ + + def _compute_basis(self, closed_form): + """ + Compute a set of functions B=(f1, ..., fn), a nxn matrix M + and a 1xn matrix C such that: + closed_form = C B + z d/dz B = M B. + """ + afactors = [_x + a for a in self.func.ap] + bfactors = [_x + b - 1 for b in self.func.bq] + expr = _x*Mul(*bfactors) - self.z*Mul(*afactors) + poly = Poly(expr, _x) + + n = poly.degree() - 1 + b = [closed_form] + for _ in range(n): + b.append(self.z*b[-1].diff(self.z)) + + self.B = Matrix(b) + self.C = Matrix([[1] + [0]*n]) + + m = eye(n) + m = m.col_insert(0, zeros(n, 1)) + l = poly.all_coeffs()[1:] + l.reverse() + self.M = m.row_insert(n, -Matrix([l])/poly.all_coeffs()[0]) + + def __init__(self, func, z, res, symbols, B=None, C=None, M=None): + z = sympify(z) + res = sympify(res) + symbols = [x for x in sympify(symbols) if func.has(x)] + + self.z = z + self.symbols = symbols + self.B = B + self.C = C + self.M = M + self.func = func + + # TODO with symbolic parameters, it could be advantageous + # (for prettier answers) to compute a basis only *after* + # instantiation + if res is not None: + self._compute_basis(res) + + @property + def closed_form(self): + return reduce(lambda s,m: s+m[0]*m[1], zip(self.C, self.B), S.Zero) + + def find_instantiations(self, func): + """ + Find substitutions of the free symbols that match ``func``. + + Return the substitution dictionaries as a list. Note that the returned + instantiations need not actually match, or be valid! + + """ + from sympy.solvers import solve + ap = func.ap + bq = func.bq + if len(ap) != len(self.func.ap) or len(bq) != len(self.func.bq): + raise TypeError('Cannot instantiate other number of parameters') + symbol_values = [] + for a in self.symbols: + if a in self.func.ap.args: + symbol_values.append(ap) + elif a in self.func.bq.args: + symbol_values.append(bq) + else: + raise ValueError("At least one of the parameters of the " + "formula must be equal to %s" % (a,)) + base_repl = [dict(list(zip(self.symbols, values))) + for values in product(*symbol_values)] + abuckets, bbuckets = [sift(params, _mod1) for params in [ap, bq]] + a_inv, b_inv = [{a: len(vals) for a, vals in bucket.items()} + for bucket in [abuckets, bbuckets]] + critical_values = [[0] for _ in self.symbols] + result = [] + _n = Dummy() + for repl in base_repl: + symb_a, symb_b = [sift(params, lambda x: _mod1(x.xreplace(repl))) + for params in [self.func.ap, self.func.bq]] + for bucket, obucket in [(abuckets, symb_a), (bbuckets, symb_b)]: + for mod in set(list(bucket.keys()) + list(obucket.keys())): + if (mod not in bucket) or (mod not in obucket) \ + or len(bucket[mod]) != len(obucket[mod]): + break + for a, vals in zip(self.symbols, critical_values): + if repl[a].free_symbols: + continue + exprs = [expr for expr in obucket[mod] if expr.has(a)] + repl0 = repl.copy() + repl0[a] += _n + for expr in exprs: + for target in bucket[mod]: + n0, = solve(expr.xreplace(repl0) - target, _n) + if n0.free_symbols: + raise ValueError("Value should not be true") + vals.append(n0) + else: + values = [] + for a, vals in zip(self.symbols, critical_values): + a0 = repl[a] + min_ = floor(min(vals)) + max_ = ceiling(max(vals)) + values.append([a0 + n for n in range(min_, max_ + 1)]) + result.extend(dict(list(zip(self.symbols, l))) for l in product(*values)) + return result + + + + +class FormulaCollection: + """ A collection of formulae to use as origins. """ + + def __init__(self): + """ Doing this globally at module init time is a pain ... """ + self.symbolic_formulae = {} + self.concrete_formulae = {} + self.formulae = [] + + add_formulae(self.formulae) + + # Now process the formulae into a helpful form. + # These dicts are indexed by (p, q). + + for f in self.formulae: + sizes = f.func.sizes + if len(f.symbols) > 0: + self.symbolic_formulae.setdefault(sizes, []).append(f) + else: + inv = f.func.build_invariants() + self.concrete_formulae.setdefault(sizes, {})[inv] = f + + def lookup_origin(self, func): + """ + Given the suitable target ``func``, try to find an origin in our + knowledge base. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import (FormulaCollection, + ... Hyper_Function) + >>> f = FormulaCollection() + >>> f.lookup_origin(Hyper_Function((), ())).closed_form + exp(_z) + >>> f.lookup_origin(Hyper_Function([1], ())).closed_form + HyperRep_power1(-1, _z) + + >>> from sympy import S + >>> i = Hyper_Function([S('1/4'), S('3/4 + 4')], [S.Half]) + >>> f.lookup_origin(i).closed_form + HyperRep_sqrts1(-1/4, _z) + """ + inv = func.build_invariants() + sizes = func.sizes + if sizes in self.concrete_formulae and \ + inv in self.concrete_formulae[sizes]: + return self.concrete_formulae[sizes][inv] + + # We don't have a concrete formula. Try to instantiate. + if sizes not in self.symbolic_formulae: + return None # Too bad... + + possible = [] + for f in self.symbolic_formulae[sizes]: + repls = f.find_instantiations(func) + for repl in repls: + func2 = f.func.xreplace(repl) + if not func2._is_suitable_origin(): + continue + diff = func2.difficulty(func) + if diff == -1: + continue + possible.append((diff, repl, f, func2)) + + # find the nearest origin + possible.sort(key=lambda x: x[0]) + for _, repl, f, func2 in possible: + f2 = Formula(func2, f.z, None, [], f.B.subs(repl), + f.C.subs(repl), f.M.subs(repl)) + if not any(e.has(S.NaN, oo, -oo, zoo) for e in [f2.B, f2.M, f2.C]): + return f2 + + return None + + +class MeijerFormula: + """ + This class represents a Meijer G-function formula. + + Its data members are: + - z, the argument + - symbols, the free symbols (parameters) in the formula + - func, the function + - B, C, M (c/f ordinary Formula) + """ + + def __init__(self, an, ap, bm, bq, z, symbols, B, C, M, matcher): + an, ap, bm, bq = [Tuple(*list(map(expand, w))) for w in [an, ap, bm, bq]] + self.func = G_Function(an, ap, bm, bq) + self.z = z + self.symbols = symbols + self._matcher = matcher + self.B = B + self.C = C + self.M = M + + @property + def closed_form(self): + return reduce(lambda s,m: s+m[0]*m[1], zip(self.C, self.B), S.Zero) + + def try_instantiate(self, func): + """ + Try to instantiate the current formula to (almost) match func. + This uses the _matcher passed on init. + """ + if func.signature != self.func.signature: + return None + res = self._matcher(func) + if res is not None: + subs, newfunc = res + return MeijerFormula(newfunc.an, newfunc.ap, newfunc.bm, newfunc.bq, + self.z, [], + self.B.subs(subs), self.C.subs(subs), + self.M.subs(subs), None) + + +class MeijerFormulaCollection: + """ + This class holds a collection of meijer g formulae. + """ + + def __init__(self): + formulae = [] + add_meijerg_formulae(formulae) + self.formulae = defaultdict(list) + for formula in formulae: + self.formulae[formula.func.signature].append(formula) + self.formulae = dict(self.formulae) + + def lookup_origin(self, func): + """ Try to find a formula that matches func. """ + if func.signature not in self.formulae: + return None + for formula in self.formulae[func.signature]: + res = formula.try_instantiate(func) + if res is not None: + return res + + +class Operator: + """ + Base class for operators to be applied to our functions. + + Explanation + =========== + + These operators are differential operators. They are by convention + expressed in the variable D = z*d/dz (although this base class does + not actually care). + Note that when the operator is applied to an object, we typically do + *not* blindly differentiate but instead use a different representation + of the z*d/dz operator (see make_derivative_operator). + + To subclass from this, define a __init__ method that initializes a + self._poly variable. This variable stores a polynomial. By convention + the generator is z*d/dz, and acts to the right of all coefficients. + + Thus this poly + x**2 + 2*z*x + 1 + represents the differential operator + (z*d/dz)**2 + 2*z**2*d/dz. + + This class is used only in the implementation of the hypergeometric + function expansion algorithm. + """ + + def apply(self, obj, op): + """ + Apply ``self`` to the object ``obj``, where the generator is ``op``. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import Operator + >>> from sympy.polys.polytools import Poly + >>> from sympy.abc import x, y, z + >>> op = Operator() + >>> op._poly = Poly(x**2 + z*x + y, x) + >>> op.apply(z**7, lambda f: f.diff(z)) + y*z**7 + 7*z**7 + 42*z**5 + """ + coeffs = self._poly.all_coeffs() + coeffs.reverse() + diffs = [obj] + for c in coeffs[1:]: + diffs.append(op(diffs[-1])) + r = coeffs[0]*diffs[0] + for c, d in zip(coeffs[1:], diffs[1:]): + r += c*d + return r + + +class MultOperator(Operator): + """ Simply multiply by a "constant" """ + + def __init__(self, p): + self._poly = Poly(p, _x) + + +class ShiftA(Operator): + """ Increment an upper index. """ + + def __init__(self, ai): + ai = sympify(ai) + if ai == 0: + raise ValueError('Cannot increment zero upper index.') + self._poly = Poly(_x/ai + 1, _x) + + def __str__(self): + return '' % (1/self._poly.all_coeffs()[0]) + + +class ShiftB(Operator): + """ Decrement a lower index. """ + + def __init__(self, bi): + bi = sympify(bi) + if bi == 1: + raise ValueError('Cannot decrement unit lower index.') + self._poly = Poly(_x/(bi - 1) + 1, _x) + + def __str__(self): + return '' % (1/self._poly.all_coeffs()[0] + 1) + + +class UnShiftA(Operator): + """ Decrement an upper index. """ + + def __init__(self, ap, bq, i, z): + """ Note: i counts from zero! """ + ap, bq, i = list(map(sympify, [ap, bq, i])) + + self._ap = ap + self._bq = bq + self._i = i + + ap = list(ap) + bq = list(bq) + ai = ap.pop(i) - 1 + + if ai == 0: + raise ValueError('Cannot decrement unit upper index.') + + m = Poly(z*ai, _x) + for a in ap: + m *= Poly(_x + a, _x) + + A = Dummy('A') + n = D = Poly(ai*A - ai, A) + for b in bq: + n *= D + (b - 1).as_poly(A) + + b0 = -n.nth(0) + if b0 == 0: + raise ValueError('Cannot decrement upper index: ' + 'cancels with lower') + + n = Poly(Poly(n.all_coeffs()[:-1], A).as_expr().subs(A, _x/ai + 1), _x) + + self._poly = Poly((n - m)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._ap, self._bq) + + +class UnShiftB(Operator): + """ Increment a lower index. """ + + def __init__(self, ap, bq, i, z): + """ Note: i counts from zero! """ + ap, bq, i = list(map(sympify, [ap, bq, i])) + + self._ap = ap + self._bq = bq + self._i = i + + ap = list(ap) + bq = list(bq) + bi = bq.pop(i) + 1 + + if bi == 0: + raise ValueError('Cannot increment -1 lower index.') + + m = Poly(_x*(bi - 1), _x) + for b in bq: + m *= Poly(_x + b - 1, _x) + + B = Dummy('B') + D = Poly((bi - 1)*B - bi + 1, B) + n = Poly(z, B) + for a in ap: + n *= (D + a.as_poly(B)) + + b0 = n.nth(0) + if b0 == 0: + raise ValueError('Cannot increment index: cancels with upper') + + n = Poly(Poly(n.all_coeffs()[:-1], B).as_expr().subs( + B, _x/(bi - 1) + 1), _x) + + self._poly = Poly((m - n)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._ap, self._bq) + + +class MeijerShiftA(Operator): + """ Increment an upper b index. """ + + def __init__(self, bi): + bi = sympify(bi) + self._poly = Poly(bi - _x, _x) + + def __str__(self): + return '' % (self._poly.all_coeffs()[1]) + + +class MeijerShiftB(Operator): + """ Decrement an upper a index. """ + + def __init__(self, bi): + bi = sympify(bi) + self._poly = Poly(1 - bi + _x, _x) + + def __str__(self): + return '' % (1 - self._poly.all_coeffs()[1]) + + +class MeijerShiftC(Operator): + """ Increment a lower b index. """ + + def __init__(self, bi): + bi = sympify(bi) + self._poly = Poly(-bi + _x, _x) + + def __str__(self): + return '' % (-self._poly.all_coeffs()[1]) + + +class MeijerShiftD(Operator): + """ Decrement a lower a index. """ + + def __init__(self, bi): + bi = sympify(bi) + self._poly = Poly(bi - 1 - _x, _x) + + def __str__(self): + return '' % (self._poly.all_coeffs()[1] + 1) + + +class MeijerUnShiftA(Operator): + """ Decrement an upper b index. """ + + def __init__(self, an, ap, bm, bq, i, z): + """ Note: i counts from zero! """ + an, ap, bm, bq, i = list(map(sympify, [an, ap, bm, bq, i])) + + self._an = an + self._ap = ap + self._bm = bm + self._bq = bq + self._i = i + + an = list(an) + ap = list(ap) + bm = list(bm) + bq = list(bq) + bi = bm.pop(i) - 1 + + m = Poly(1, _x) * prod(Poly(b - _x, _x) for b in bm) * prod(Poly(_x - b, _x) for b in bq) + + A = Dummy('A') + D = Poly(bi - A, A) + n = Poly(z, A) * prod((D + 1 - a) for a in an) * prod((-D + a - 1) for a in ap) + + b0 = n.nth(0) + if b0 == 0: + raise ValueError('Cannot decrement upper b index (cancels)') + + n = Poly(Poly(n.all_coeffs()[:-1], A).as_expr().subs(A, bi - _x), _x) + + self._poly = Poly((m - n)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._an, self._ap, self._bm, self._bq) + + +class MeijerUnShiftB(Operator): + """ Increment an upper a index. """ + + def __init__(self, an, ap, bm, bq, i, z): + """ Note: i counts from zero! """ + an, ap, bm, bq, i = list(map(sympify, [an, ap, bm, bq, i])) + + self._an = an + self._ap = ap + self._bm = bm + self._bq = bq + self._i = i + + an = list(an) + ap = list(ap) + bm = list(bm) + bq = list(bq) + ai = an.pop(i) + 1 + + m = Poly(z, _x) + for a in an: + m *= Poly(1 - a + _x, _x) + for a in ap: + m *= Poly(a - 1 - _x, _x) + + B = Dummy('B') + D = Poly(B + ai - 1, B) + n = Poly(1, B) + for b in bm: + n *= (-D + b) + for b in bq: + n *= (D - b) + + b0 = n.nth(0) + if b0 == 0: + raise ValueError('Cannot increment upper a index (cancels)') + + n = Poly(Poly(n.all_coeffs()[:-1], B).as_expr().subs( + B, 1 - ai + _x), _x) + + self._poly = Poly((m - n)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._an, self._ap, self._bm, self._bq) + + +class MeijerUnShiftC(Operator): + """ Decrement a lower b index. """ + # XXX this is "essentially" the same as MeijerUnShiftA. This "essentially" + # can be made rigorous using the functional equation G(1/z) = G'(z), + # where G' denotes a G function of slightly altered parameters. + # However, sorting out the details seems harder than just coding it + # again. + + def __init__(self, an, ap, bm, bq, i, z): + """ Note: i counts from zero! """ + an, ap, bm, bq, i = list(map(sympify, [an, ap, bm, bq, i])) + + self._an = an + self._ap = ap + self._bm = bm + self._bq = bq + self._i = i + + an = list(an) + ap = list(ap) + bm = list(bm) + bq = list(bq) + bi = bq.pop(i) - 1 + + m = Poly(1, _x) + for b in bm: + m *= Poly(b - _x, _x) + for b in bq: + m *= Poly(_x - b, _x) + + C = Dummy('C') + D = Poly(bi + C, C) + n = Poly(z, C) + for a in an: + n *= (D + 1 - a) + for a in ap: + n *= (-D + a - 1) + + b0 = n.nth(0) + if b0 == 0: + raise ValueError('Cannot decrement lower b index (cancels)') + + n = Poly(Poly(n.all_coeffs()[:-1], C).as_expr().subs(C, _x - bi), _x) + + self._poly = Poly((m - n)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._an, self._ap, self._bm, self._bq) + + +class MeijerUnShiftD(Operator): + """ Increment a lower a index. """ + # XXX This is essentially the same as MeijerUnShiftA. + # See comment at MeijerUnShiftC. + + def __init__(self, an, ap, bm, bq, i, z): + """ Note: i counts from zero! """ + an, ap, bm, bq, i = list(map(sympify, [an, ap, bm, bq, i])) + + self._an = an + self._ap = ap + self._bm = bm + self._bq = bq + self._i = i + + an = list(an) + ap = list(ap) + bm = list(bm) + bq = list(bq) + ai = ap.pop(i) + 1 + + m = Poly(z, _x) + for a in an: + m *= Poly(1 - a + _x, _x) + for a in ap: + m *= Poly(a - 1 - _x, _x) + + B = Dummy('B') # - this is the shift operator `D_I` + D = Poly(ai - 1 - B, B) + n = Poly(1, B) + for b in bm: + n *= (-D + b) + for b in bq: + n *= (D - b) + + b0 = n.nth(0) + if b0 == 0: + raise ValueError('Cannot increment lower a index (cancels)') + + n = Poly(Poly(n.all_coeffs()[:-1], B).as_expr().subs( + B, ai - 1 - _x), _x) + + self._poly = Poly((m - n)/b0, _x) + + def __str__(self): + return '' % (self._i, + self._an, self._ap, self._bm, self._bq) + + +class ReduceOrder(Operator): + """ Reduce Order by cancelling an upper and a lower index. """ + + def __new__(cls, ai, bj): + """ For convenience if reduction is not possible, return None. """ + ai = sympify(ai) + bj = sympify(bj) + n = ai - bj + if not n.is_Integer or n < 0: + return None + if bj.is_integer and bj.is_nonpositive: + return None + + expr = Operator.__new__(cls) + + p = S.One + for k in range(n): + p *= (_x + bj + k)/(bj + k) + + expr._poly = Poly(p, _x) + expr._a = ai + expr._b = bj + + return expr + + @classmethod + def _meijer(cls, b, a, sign): + """ Cancel b + sign*s and a + sign*s + This is for meijer G functions. """ + b = sympify(b) + a = sympify(a) + n = b - a + if n.is_negative or not n.is_Integer: + return None + + expr = Operator.__new__(cls) + + p = S.One + for k in range(n): + p *= (sign*_x + a + k) + + expr._poly = Poly(p, _x) + if sign == -1: + expr._a = b + expr._b = a + else: + expr._b = Add(1, a - 1, evaluate=False) + expr._a = Add(1, b - 1, evaluate=False) + + return expr + + @classmethod + def meijer_minus(cls, b, a): + return cls._meijer(b, a, -1) + + @classmethod + def meijer_plus(cls, a, b): + return cls._meijer(1 - a, 1 - b, 1) + + def __str__(self): + return '' % \ + (self._a, self._b) + + +def _reduce_order(ap, bq, gen, key): + """ Order reduction algorithm used in Hypergeometric and Meijer G """ + ap = list(ap) + bq = list(bq) + + ap.sort(key=key) + bq.sort(key=key) + + nap = [] + # we will edit bq in place + operators = [] + for a in ap: + op = None + for i in range(len(bq)): + op = gen(a, bq[i]) + if op is not None: + bq.pop(i) + break + if op is None: + nap.append(a) + else: + operators.append(op) + + return nap, bq, operators + + +def reduce_order(func): + """ + Given the hypergeometric function ``func``, find a sequence of operators to + reduces order as much as possible. + + Explanation + =========== + + Return (newfunc, [operators]), where applying the operators to the + hypergeometric function newfunc yields func. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import reduce_order, Hyper_Function + >>> reduce_order(Hyper_Function((1, 2), (3, 4))) + (Hyper_Function((1, 2), (3, 4)), []) + >>> reduce_order(Hyper_Function((1,), (1,))) + (Hyper_Function((), ()), []) + >>> reduce_order(Hyper_Function((2, 4), (3, 3))) + (Hyper_Function((2,), (3,)), []) + """ + nap, nbq, operators = _reduce_order(func.ap, func.bq, ReduceOrder, default_sort_key) + + return Hyper_Function(Tuple(*nap), Tuple(*nbq)), operators + + +def reduce_order_meijer(func): + """ + Given the Meijer G function parameters, ``func``, find a sequence of + operators that reduces order as much as possible. + + Return newfunc, [operators]. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import (reduce_order_meijer, + ... G_Function) + >>> reduce_order_meijer(G_Function([3, 4], [5, 6], [3, 4], [1, 2]))[0] + G_Function((4, 3), (5, 6), (3, 4), (2, 1)) + >>> reduce_order_meijer(G_Function([3, 4], [5, 6], [3, 4], [1, 8]))[0] + G_Function((3,), (5, 6), (3, 4), (1,)) + >>> reduce_order_meijer(G_Function([3, 4], [5, 6], [7, 5], [1, 5]))[0] + G_Function((3,), (), (), (1,)) + >>> reduce_order_meijer(G_Function([3, 4], [5, 6], [7, 5], [5, 3]))[0] + G_Function((), (), (), ()) + """ + + nan, nbq, ops1 = _reduce_order(func.an, func.bq, ReduceOrder.meijer_plus, + lambda x: default_sort_key(-x)) + nbm, nap, ops2 = _reduce_order(func.bm, func.ap, ReduceOrder.meijer_minus, + default_sort_key) + + return G_Function(nan, nap, nbm, nbq), ops1 + ops2 + + +def make_derivative_operator(M, z): + """ Create a derivative operator, to be passed to Operator.apply. """ + def doit(C): + r = z*C.diff(z) + C*M + r = r.applyfunc(make_simp(z)) + return r + return doit + + +def apply_operators(obj, ops, op): + """ + Apply the list of operators ``ops`` to object ``obj``, substituting + ``op`` for the generator. + """ + res = obj + for o in reversed(ops): + res = o.apply(res, op) + return res + + +def devise_plan(target, origin, z): + """ + Devise a plan (consisting of shift and un-shift operators) to be applied + to the hypergeometric function ``target`` to yield ``origin``. + Returns a list of operators. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import devise_plan, Hyper_Function + >>> from sympy.abc import z + + Nothing to do: + + >>> devise_plan(Hyper_Function((1, 2), ()), Hyper_Function((1, 2), ()), z) + [] + >>> devise_plan(Hyper_Function((), (1, 2)), Hyper_Function((), (1, 2)), z) + [] + + Very simple plans: + + >>> devise_plan(Hyper_Function((2,), ()), Hyper_Function((1,), ()), z) + [] + >>> devise_plan(Hyper_Function((), (2,)), Hyper_Function((), (1,)), z) + [] + + Several buckets: + + >>> from sympy import S + >>> devise_plan(Hyper_Function((1, S.Half), ()), + ... Hyper_Function((2, S('3/2')), ()), z) #doctest: +NORMALIZE_WHITESPACE + [, + ] + + A slightly more complicated plan: + + >>> devise_plan(Hyper_Function((1, 3), ()), Hyper_Function((2, 2), ()), z) + [, ] + + Another more complicated plan: (note that the ap have to be shifted first!) + + >>> devise_plan(Hyper_Function((1, -1), (2,)), Hyper_Function((3, -2), (4,)), z) + [, , + , + , ] + """ + abuckets, bbuckets, nabuckets, nbbuckets = [sift(params, _mod1) for + params in (target.ap, target.bq, origin.ap, origin.bq)] + + if len(list(abuckets.keys())) != len(list(nabuckets.keys())) or \ + len(list(bbuckets.keys())) != len(list(nbbuckets.keys())): + raise ValueError('%s not reachable from %s' % (target, origin)) + + ops = [] + + def do_shifts(fro, to, inc, dec): + ops = [] + for i in range(len(fro)): + if to[i] - fro[i] > 0: + sh = inc + ch = 1 + else: + sh = dec + ch = -1 + + while to[i] != fro[i]: + ops += [sh(fro, i)] + fro[i] += ch + + return ops + + def do_shifts_a(nal, nbk, al, aother, bother): + """ Shift us from (nal, nbk) to (al, nbk). """ + return do_shifts(nal, al, lambda p, i: ShiftA(p[i]), + lambda p, i: UnShiftA(p + aother, nbk + bother, i, z)) + + def do_shifts_b(nal, nbk, bk, aother, bother): + """ Shift us from (nal, nbk) to (nal, bk). """ + return do_shifts(nbk, bk, + lambda p, i: UnShiftB(nal + aother, p + bother, i, z), + lambda p, i: ShiftB(p[i])) + + for r in sorted(list(abuckets.keys()) + list(bbuckets.keys()), key=default_sort_key): + al = () + nal = () + bk = () + nbk = () + if r in abuckets: + al = abuckets[r] + nal = nabuckets[r] + if r in bbuckets: + bk = bbuckets[r] + nbk = nbbuckets[r] + if len(al) != len(nal) or len(bk) != len(nbk): + raise ValueError('%s not reachable from %s' % (target, origin)) + + al, nal, bk, nbk = [sorted(w, key=default_sort_key) + for w in [al, nal, bk, nbk]] + + def others(dic, key): + l = [] + for k in dic: + if k != key: + l.extend(dic[k]) + return l + aother = others(nabuckets, r) + bother = others(nbbuckets, r) + + if len(al) == 0: + # there can be no complications, just shift the bs as we please + ops += do_shifts_b([], nbk, bk, aother, bother) + elif len(bk) == 0: + # there can be no complications, just shift the as as we please + ops += do_shifts_a(nal, [], al, aother, bother) + else: + namax = nal[-1] + amax = al[-1] + + if nbk[0] - namax <= 0 or bk[0] - amax <= 0: + raise ValueError('Non-suitable parameters.') + + if namax - amax > 0: + # we are going to shift down - first do the as, then the bs + ops += do_shifts_a(nal, nbk, al, aother, bother) + ops += do_shifts_b(al, nbk, bk, aother, bother) + else: + # we are going to shift up - first do the bs, then the as + ops += do_shifts_b(nal, nbk, bk, aother, bother) + ops += do_shifts_a(nal, bk, al, aother, bother) + + nabuckets[r] = al + nbbuckets[r] = bk + + ops.reverse() + return ops + + +def try_shifted_sum(func, z): + """ Try to recognise a hypergeometric sum that starts from k > 0. """ + abuckets, bbuckets = sift(func.ap, _mod1), sift(func.bq, _mod1) + if len(abuckets[S.Zero]) != 1: + return None + r = abuckets[S.Zero][0] + if r <= 0: + return None + if S.Zero not in bbuckets: + return None + l = list(bbuckets[S.Zero]) + l.sort() + k = l[0] + if k <= 0: + return None + + nap = list(func.ap) + nap.remove(r) + nbq = list(func.bq) + nbq.remove(k) + k -= 1 + nap = [x - k for x in nap] + nbq = [x - k for x in nbq] + + ops = [] + for n in range(r - 1): + ops.append(ShiftA(n + 1)) + ops.reverse() + + fac = factorial(k)/z**k + fac *= Mul(*[rf(b, k) for b in nbq]) + fac /= Mul(*[rf(a, k) for a in nap]) + + ops += [MultOperator(fac)] + + p = 0 + for n in range(k): + m = z**n/factorial(n) + m *= Mul(*[rf(a, n) for a in nap]) + m /= Mul(*[rf(b, n) for b in nbq]) + p += m + + return Hyper_Function(nap, nbq), ops, -p + + +def try_polynomial(func, z): + """ Recognise polynomial cases. Returns None if not such a case. + Requires order to be fully reduced. """ + abuckets, bbuckets = sift(func.ap, _mod1), sift(func.bq, _mod1) + a0 = abuckets[S.Zero] + b0 = bbuckets[S.Zero] + a0.sort() + b0.sort() + al0 = [x for x in a0 if x <= 0] + bl0 = [x for x in b0 if x <= 0] + + if bl0 and all(a < bl0[-1] for a in al0): + return oo + if not al0: + return None + + a = al0[-1] + fac = 1 + res = S.One + for n in Tuple(*list(range(-a))): + fac *= z + fac /= n + 1 + fac *= Mul(*[a + n for a in func.ap]) + fac /= Mul(*[b + n for b in func.bq]) + res += fac + return res + + +def try_lerchphi(func): + """ + Try to find an expression for Hyper_Function ``func`` in terms of Lerch + Transcendents. + + Return None if no such expression can be found. + """ + # This is actually quite simple, and is described in Roach's paper, + # section 18. + # We don't need to implement the reduction to polylog here, this + # is handled by expand_func. + + # First we need to figure out if the summation coefficient is a rational + # function of the summation index, and construct that rational function. + abuckets, bbuckets = sift(func.ap, _mod1), sift(func.bq, _mod1) + + paired = {} + for key, value in abuckets.items(): + if key != 0 and key not in bbuckets: + return None + bvalue = bbuckets[key] + paired[key] = (list(value), list(bvalue)) + bbuckets.pop(key, None) + if bbuckets != {}: + return None + if S.Zero not in abuckets: + return None + aints, bints = paired[S.Zero] + # Account for the additional n! in denominator + paired[S.Zero] = (aints, bints + [1]) + + t = Dummy('t') + numer = S.One + denom = S.One + for key, (avalue, bvalue) in paired.items(): + if len(avalue) != len(bvalue): + return None + # Note that since order has been reduced fully, all the b are + # bigger than all the a they differ from by an integer. In particular + # if there are any negative b left, this function is not well-defined. + for a, b in zip(avalue, bvalue): + if (a - b).is_positive: + k = a - b + numer *= rf(b + t, k) + denom *= rf(b, k) + else: + k = b - a + numer *= rf(a, k) + denom *= rf(a + t, k) + + # Now do a partial fraction decomposition. + # We assemble two structures: a list monomials of pairs (a, b) representing + # a*t**b (b a non-negative integer), and a dict terms, where + # terms[a] = [(b, c)] means that there is a term b/(t-a)**c. + part = apart(numer/denom, t) + args = Add.make_args(part) + monomials = [] + terms = {} + for arg in args: + numer, denom = arg.as_numer_denom() + if not denom.has(t): + p = Poly(numer, t) + if not p.is_monomial: + raise TypeError("p should be monomial") + ((b, ), a) = p.LT() + monomials += [(a/denom, b)] + continue + if numer.has(t): + raise NotImplementedError('Need partial fraction decomposition' + ' with linear denominators') + indep, [dep] = denom.as_coeff_mul(t) + n = 1 + if dep.is_Pow: + n = dep.exp + dep = dep.base + if dep == t: + a = 0 + elif dep.is_Add: + a, tmp = dep.as_independent(t) + b = 1 + if tmp != t: + b, _ = tmp.as_independent(t) + if dep != b*t + a: + raise NotImplementedError('unrecognised form %s' % dep) + a /= b + indep *= b**n + else: + raise NotImplementedError('unrecognised form of partial fraction') + terms.setdefault(a, []).append((numer/indep, n)) + + # Now that we have this information, assemble our formula. All the + # monomials yield rational functions and go into one basis element. + # The terms[a] are related by differentiation. If the largest exponent is + # n, we need lerchphi(z, k, a) for k = 1, 2, ..., n. + # deriv maps a basis to its derivative, expressed as a C(z)-linear + # combination of other basis elements. + deriv = {} + coeffs = {} + z = Dummy('z') + monomials.sort(key=lambda x: x[1]) + mon = {0: 1/(1 - z)} + if monomials: + for k in range(monomials[-1][1]): + mon[k + 1] = z*mon[k].diff(z) + for a, n in monomials: + coeffs.setdefault(S.One, []).append(a*mon[n]) + for a, l in terms.items(): + for c, k in l: + coeffs.setdefault(lerchphi(z, k, a), []).append(c) + l.sort(key=lambda x: x[1]) + for k in range(2, l[-1][1] + 1): + deriv[lerchphi(z, k, a)] = [(-a, lerchphi(z, k, a)), + (1, lerchphi(z, k - 1, a))] + deriv[lerchphi(z, 1, a)] = [(-a, lerchphi(z, 1, a)), + (1/(1 - z), S.One)] + trans = {} + for n, b in enumerate([S.One] + list(deriv.keys())): + trans[b] = n + basis = [expand_func(b) for (b, _) in sorted(trans.items(), + key=lambda x:x[1])] + B = Matrix(basis) + C = Matrix([[0]*len(B)]) + for b, c in coeffs.items(): + C[trans[b]] = Add(*c) + M = zeros(len(B)) + for b, l in deriv.items(): + for c, b2 in l: + M[trans[b], trans[b2]] = c + return Formula(func, z, None, [], B, C, M) + + +def build_hypergeometric_formula(func): + """ + Create a formula object representing the hypergeometric function ``func``. + + """ + # We know that no `ap` are negative integers, otherwise "detect poly" + # would have kicked in. However, `ap` could be empty. In this case we can + # use a different basis. + # I'm not aware of a basis that works in all cases. + z = Dummy('z') + if func.ap: + afactors = [_x + a for a in func.ap] + bfactors = [_x + b - 1 for b in func.bq] + expr = _x*Mul(*bfactors) - z*Mul(*afactors) + poly = Poly(expr, _x) + n = poly.degree() + basis = [] + M = zeros(n) + for k in range(n): + a = func.ap[0] + k + basis += [hyper([a] + list(func.ap[1:]), func.bq, z)] + if k < n - 1: + M[k, k] = -a + M[k, k + 1] = a + B = Matrix(basis) + C = Matrix([[1] + [0]*(n - 1)]) + derivs = [eye(n)] + for k in range(n): + derivs.append(M*derivs[k]) + l = poly.all_coeffs() + l.reverse() + res = [0]*n + for k, c in enumerate(l): + for r, d in enumerate(C*derivs[k]): + res[r] += c*d + for k, c in enumerate(res): + M[n - 1, k] = -c/derivs[n - 1][0, n - 1]/poly.all_coeffs()[0] + return Formula(func, z, None, [], B, C, M) + else: + # Since there are no `ap`, none of the `bq` can be non-positive + # integers. + basis = [] + bq = list(func.bq[:]) + for i in range(len(bq)): + basis += [hyper([], bq, z)] + bq[i] += 1 + basis += [hyper([], bq, z)] + B = Matrix(basis) + n = len(B) + C = Matrix([[1] + [0]*(n - 1)]) + M = zeros(n) + M[0, n - 1] = z/Mul(*func.bq) + for k in range(1, n): + M[k, k - 1] = func.bq[k - 1] + M[k, k] = -func.bq[k - 1] + return Formula(func, z, None, [], B, C, M) + + +def hyperexpand_special(ap, bq, z): + """ + Try to find a closed-form expression for hyper(ap, bq, z), where ``z`` + is supposed to be a "special" value, e.g. 1. + + This function tries various of the classical summation formulae + (Gauss, Saalschuetz, etc). + """ + # This code is very ad-hoc. There are many clever algorithms + # (notably Zeilberger's) related to this problem. + # For now we just want a few simple cases to work. + p, q = len(ap), len(bq) + z_ = z + z = unpolarify(z) + if z == 0: + return S.One + from sympy.simplify.simplify import simplify + if p == 2 and q == 1: + # 2F1 + a, b, c = ap + bq + if z == 1: + # Gauss + return gamma(c - a - b)*gamma(c)/gamma(c - a)/gamma(c - b) + if z == -1 and simplify(b - a + c) == 1: + b, a = a, b + if z == -1 and simplify(a - b + c) == 1: + # Kummer + if b.is_integer and b.is_negative: + return 2*cos(pi*b/2)*gamma(-b)*gamma(b - a + 1) \ + /gamma(-b/2)/gamma(b/2 - a + 1) + else: + return gamma(b/2 + 1)*gamma(b - a + 1) \ + /gamma(b + 1)/gamma(b/2 - a + 1) + # TODO tons of more formulae + # investigate what algorithms exist + return hyper(ap, bq, z_) + +_collection = None + + +def _hyperexpand(func, z, ops0=[], z0=Dummy('z0'), premult=1, prem=0, + rewrite='default'): + """ + Try to find an expression for the hypergeometric function ``func``. + + Explanation + =========== + + The result is expressed in terms of a dummy variable ``z0``. Then it + is multiplied by ``premult``. Then ``ops0`` is applied. + ``premult`` must be a*z**prem for some a independent of ``z``. + """ + + if z.is_zero: + return S.One + + from sympy.simplify.simplify import simplify + + z = polarify(z, subs=False) + if rewrite == 'default': + rewrite = 'nonrepsmall' + + def carryout_plan(f, ops): + C = apply_operators(f.C.subs(f.z, z0), ops, + make_derivative_operator(f.M.subs(f.z, z0), z0)) + C = apply_operators(C, ops0, + make_derivative_operator(f.M.subs(f.z, z0) + + prem*eye(f.M.shape[0]), z0)) + + if premult == 1: + C = C.applyfunc(make_simp(z0)) + r = reduce(lambda s,m: s+m[0]*m[1], zip(C, f.B.subs(f.z, z0)), S.Zero)*premult + res = r.subs(z0, z) + if rewrite: + res = res.rewrite(rewrite) + return res + + # TODO + # The following would be possible: + # *) PFD Duplication (see Kelly Roach's paper) + # *) In a similar spirit, try_lerchphi() can be generalised considerably. + + global _collection + if _collection is None: + _collection = FormulaCollection() + + debug('Trying to expand hypergeometric function ', func) + + # First reduce order as much as possible. + func, ops = reduce_order(func) + if ops: + debug(' Reduced order to ', func) + else: + debug(' Could not reduce order.') + + # Now try polynomial cases + res = try_polynomial(func, z0) + if res is not None: + debug(' Recognised polynomial.') + p = apply_operators(res, ops, lambda f: z0*f.diff(z0)) + p = apply_operators(p*premult, ops0, lambda f: z0*f.diff(z0)) + return unpolarify(simplify(p).subs(z0, z)) + + # Try to recognise a shifted sum. + p = S.Zero + res = try_shifted_sum(func, z0) + if res is not None: + func, nops, p = res + debug(' Recognised shifted sum, reduced order to ', func) + ops += nops + + # apply the plan for poly + p = apply_operators(p, ops, lambda f: z0*f.diff(z0)) + p = apply_operators(p*premult, ops0, lambda f: z0*f.diff(z0)) + p = simplify(p).subs(z0, z) + + # Try special expansions early. + if unpolarify(z) in [1, -1] and (len(func.ap), len(func.bq)) == (2, 1): + f = build_hypergeometric_formula(func) + r = carryout_plan(f, ops).replace(hyper, hyperexpand_special) + if not r.has(hyper): + return r + p + + # Try to find a formula in our collection + formula = _collection.lookup_origin(func) + + # Now try a lerch phi formula + if formula is None: + formula = try_lerchphi(func) + + if formula is None: + debug(' Could not find an origin. ', + 'Will return answer in terms of ' + 'simpler hypergeometric functions.') + formula = build_hypergeometric_formula(func) + + debug(' Found an origin: ', formula.closed_form, ' ', formula.func) + + # We need to find the operators that convert formula into func. + ops += devise_plan(func, formula.func, z0) + + # Now carry out the plan. + r = carryout_plan(formula, ops) + p + + return powdenest(r, polar=True).replace(hyper, hyperexpand_special) + + +def devise_plan_meijer(fro, to, z): + """ + Find operators to convert G-function ``fro`` into G-function ``to``. + + Explanation + =========== + + It is assumed that ``fro`` and ``to`` have the same signatures, and that in fact + any corresponding pair of parameters differs by integers, and a direct path + is possible. I.e. if there are parameters a1 b1 c1 and a2 b2 c2 it is + assumed that a1 can be shifted to a2, etc. The only thing this routine + determines is the order of shifts to apply, nothing clever will be tried. + It is also assumed that ``fro`` is suitable. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import (devise_plan_meijer, + ... G_Function) + >>> from sympy.abc import z + + Empty plan: + + >>> devise_plan_meijer(G_Function([1], [2], [3], [4]), + ... G_Function([1], [2], [3], [4]), z) + [] + + Very simple plans: + + >>> devise_plan_meijer(G_Function([0], [], [], []), + ... G_Function([1], [], [], []), z) + [] + >>> devise_plan_meijer(G_Function([0], [], [], []), + ... G_Function([-1], [], [], []), z) + [] + >>> devise_plan_meijer(G_Function([], [1], [], []), + ... G_Function([], [2], [], []), z) + [] + + Slightly more complicated plans: + + >>> devise_plan_meijer(G_Function([0], [], [], []), + ... G_Function([2], [], [], []), z) + [, + ] + >>> devise_plan_meijer(G_Function([0], [], [0], []), + ... G_Function([-1], [], [1], []), z) + [, ] + + Order matters: + + >>> devise_plan_meijer(G_Function([0], [], [0], []), + ... G_Function([1], [], [1], []), z) + [, ] + """ + # TODO for now, we use the following simple heuristic: inverse-shift + # when possible, shift otherwise. Give up if we cannot make progress. + + def try_shift(f, t, shifter, diff, counter): + """ Try to apply ``shifter`` in order to bring some element in ``f`` + nearer to its counterpart in ``to``. ``diff`` is +/- 1 and + determines the effect of ``shifter``. Counter is a list of elements + blocking the shift. + + Return an operator if change was possible, else None. + """ + for idx, (a, b) in enumerate(zip(f, t)): + if ( + (a - b).is_integer and (b - a)/diff > 0 and + all(a != x for x in counter)): + sh = shifter(idx) + f[idx] += diff + return sh + fan = list(fro.an) + fap = list(fro.ap) + fbm = list(fro.bm) + fbq = list(fro.bq) + ops = [] + change = True + while change: + change = False + op = try_shift(fan, to.an, + lambda i: MeijerUnShiftB(fan, fap, fbm, fbq, i, z), + 1, fbm + fbq) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fap, to.ap, + lambda i: MeijerUnShiftD(fan, fap, fbm, fbq, i, z), + 1, fbm + fbq) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fbm, to.bm, + lambda i: MeijerUnShiftA(fan, fap, fbm, fbq, i, z), + -1, fan + fap) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fbq, to.bq, + lambda i: MeijerUnShiftC(fan, fap, fbm, fbq, i, z), + -1, fan + fap) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fan, to.an, lambda i: MeijerShiftB(fan[i]), -1, []) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fap, to.ap, lambda i: MeijerShiftD(fap[i]), -1, []) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fbm, to.bm, lambda i: MeijerShiftA(fbm[i]), 1, []) + if op is not None: + ops += [op] + change = True + continue + op = try_shift(fbq, to.bq, lambda i: MeijerShiftC(fbq[i]), 1, []) + if op is not None: + ops += [op] + change = True + continue + if fan != list(to.an) or fap != list(to.ap) or fbm != list(to.bm) or \ + fbq != list(to.bq): + raise NotImplementedError('Could not devise plan.') + ops.reverse() + return ops + +_meijercollection = None + + +def _meijergexpand(func, z0, allow_hyper=False, rewrite='default', + place=None): + """ + Try to find an expression for the Meijer G function specified + by the G_Function ``func``. If ``allow_hyper`` is True, then returning + an expression in terms of hypergeometric functions is allowed. + + Currently this just does Slater's theorem. + If expansions exist both at zero and at infinity, ``place`` + can be set to ``0`` or ``zoo`` for the preferred choice. + """ + global _meijercollection + if _meijercollection is None: + _meijercollection = MeijerFormulaCollection() + if rewrite == 'default': + rewrite = None + + func0 = func + debug('Try to expand Meijer G function corresponding to ', func) + + # We will play games with analytic continuation - rather use a fresh symbol + z = Dummy('z') + + func, ops = reduce_order_meijer(func) + if ops: + debug(' Reduced order to ', func) + else: + debug(' Could not reduce order.') + + # Try to find a direct formula + f = _meijercollection.lookup_origin(func) + if f is not None: + debug(' Found a Meijer G formula: ', f.func) + ops += devise_plan_meijer(f.func, func, z) + + # Now carry out the plan. + C = apply_operators(f.C.subs(f.z, z), ops, + make_derivative_operator(f.M.subs(f.z, z), z)) + + C = C.applyfunc(make_simp(z)) + r = C*f.B.subs(f.z, z) + r = r[0].subs(z, z0) + return powdenest(r, polar=True) + + debug(" Could not find a direct formula. Trying Slater's theorem.") + + # TODO the following would be possible: + # *) Paired Index Theorems + # *) PFD Duplication + # (See Kelly Roach's paper for details on either.) + # + # TODO Also, we tend to create combinations of gamma functions that can be + # simplified. + + def can_do(pbm, pap): + """ Test if slater applies. """ + for i in pbm: + if len(pbm[i]) > 1: + l = 0 + if i in pap: + l = len(pap[i]) + if l + 1 < len(pbm[i]): + return False + return True + + def do_slater(an, bm, ap, bq, z, zfinal): + # zfinal is the value that will eventually be substituted for z. + # We pass it to _hyperexpand to improve performance. + func = G_Function(an, bm, ap, bq) + _, pbm, pap, _ = func.compute_buckets() + if not can_do(pbm, pap): + return S.Zero, False + + cond = len(an) + len(ap) < len(bm) + len(bq) + if len(an) + len(ap) == len(bm) + len(bq): + cond = abs(z) < 1 + if cond is False: + return S.Zero, False + + res = S.Zero + for m in pbm: + if len(pbm[m]) == 1: + bh = pbm[m][0] + fac = 1 + bo = list(bm) + bo.remove(bh) + for bj in bo: + fac *= gamma(bj - bh) + for aj in an: + fac *= gamma(1 + bh - aj) + for bj in bq: + fac /= gamma(1 + bh - bj) + for aj in ap: + fac /= gamma(aj - bh) + nap = [1 + bh - a for a in list(an) + list(ap)] + nbq = [1 + bh - b for b in list(bo) + list(bq)] + + k = polar_lift(S.NegativeOne**(len(ap) - len(bm))) + harg = k*zfinal + # NOTE even though k "is" +-1, this has to be t/k instead of + # t*k ... we are using polar numbers for consistency! + premult = (t/k)**bh + hyp = _hyperexpand(Hyper_Function(nap, nbq), harg, ops, + t, premult, bh, rewrite=None) + res += fac * hyp + else: + b_ = pbm[m][0] + ki = [bi - b_ for bi in pbm[m][1:]] + u = len(ki) + li = [ai - b_ for ai in pap[m][:u + 1]] + bo = list(bm) + for b in pbm[m]: + bo.remove(b) + ao = list(ap) + for a in pap[m][:u]: + ao.remove(a) + lu = li[-1] + di = [l - k for (l, k) in zip(li, ki)] + + # We first work out the integrand: + s = Dummy('s') + integrand = z**s + for b in bm: + if not Mod(b, 1) and b.is_Number: + b = int(round(b)) + integrand *= gamma(b - s) + for a in an: + integrand *= gamma(1 - a + s) + for b in bq: + integrand /= gamma(1 - b + s) + for a in ap: + integrand /= gamma(a - s) + + # Now sum the finitely many residues: + # XXX This speeds up some cases - is it a good idea? + integrand = expand_func(integrand) + for r in range(int(round(lu))): + resid = residue(integrand, s, b_ + r) + resid = apply_operators(resid, ops, lambda f: z*f.diff(z)) + res -= resid + + # Now the hypergeometric term. + au = b_ + lu + k = polar_lift(S.NegativeOne**(len(ao) + len(bo) + 1)) + harg = k*zfinal + premult = (t/k)**au + nap = [1 + au - a for a in list(an) + list(ap)] + [1] + nbq = [1 + au - b for b in list(bm) + list(bq)] + + hyp = _hyperexpand(Hyper_Function(nap, nbq), harg, ops, + t, premult, au, rewrite=None) + + C = S.NegativeOne**(lu)/factorial(lu) + for i in range(u): + C *= S.NegativeOne**di[i]/rf(lu - li[i] + 1, di[i]) + for a in an: + C *= gamma(1 - a + au) + for b in bo: + C *= gamma(b - au) + for a in ao: + C /= gamma(a - au) + for b in bq: + C /= gamma(1 - b + au) + + res += C*hyp + + return res, cond + + t = Dummy('t') + slater1, cond1 = do_slater(func.an, func.bm, func.ap, func.bq, z, z0) + + def tr(l): + return [1 - x for x in l] + + for op in ops: + op._poly = Poly(op._poly.subs({z: 1/t, _x: -_x}), _x) + slater2, cond2 = do_slater(tr(func.bm), tr(func.an), tr(func.bq), tr(func.ap), + t, 1/z0) + + slater1 = powdenest(slater1.subs(z, z0), polar=True) + slater2 = powdenest(slater2.subs(t, 1/z0), polar=True) + if not isinstance(cond2, bool): + cond2 = cond2.subs(t, 1/z) + + m = func(z) + if m.delta > 0 or \ + (m.delta == 0 and len(m.ap) == len(m.bq) and + (re(m.nu) < -1) is not False and polar_lift(z0) == polar_lift(1)): + # The condition delta > 0 means that the convergence region is + # connected. Any expression we find can be continued analytically + # to the entire convergence region. + # The conditions delta==0, p==q, re(nu) < -1 imply that G is continuous + # on the positive reals, so the values at z=1 agree. + if cond1 is not False: + cond1 = True + if cond2 is not False: + cond2 = True + + if cond1 is True: + slater1 = slater1.rewrite(rewrite or 'nonrep') + else: + slater1 = slater1.rewrite(rewrite or 'nonrepsmall') + if cond2 is True: + slater2 = slater2.rewrite(rewrite or 'nonrep') + else: + slater2 = slater2.rewrite(rewrite or 'nonrepsmall') + + if cond1 is not False and cond2 is not False: + # If one condition is False, there is no choice. + if place == 0: + cond2 = False + if place == zoo: + cond1 = False + + if not isinstance(cond1, bool): + cond1 = cond1.subs(z, z0) + if not isinstance(cond2, bool): + cond2 = cond2.subs(z, z0) + + def weight(expr, cond): + if cond is True: + c0 = 0 + elif cond is False: + c0 = 1 + else: + c0 = 2 + if expr.has(oo, zoo, -oo, nan): + # XXX this actually should not happen, but consider + # S('meijerg(((0, -1/2, 0, -1/2, 1/2), ()), ((0,), + # (-1/2, -1/2, -1/2, -1)), exp_polar(I*pi))/4') + c0 = 3 + return (c0, expr.count(hyper), expr.count_ops()) + + w1 = weight(slater1, cond1) + w2 = weight(slater2, cond2) + if min(w1, w2) <= (0, 1, oo): + if w1 < w2: + return slater1 + else: + return slater2 + if max(w1[0], w2[0]) <= 1 and max(w1[1], w2[1]) <= 1: + return Piecewise((slater1, cond1), (slater2, cond2), (func0(z0), True)) + + # We couldn't find an expression without hypergeometric functions. + # TODO it would be helpful to give conditions under which the integral + # is known to diverge. + r = Piecewise((slater1, cond1), (slater2, cond2), (func0(z0), True)) + if r.has(hyper) and not allow_hyper: + debug(' Could express using hypergeometric functions, ' + 'but not allowed.') + if not r.has(hyper) or allow_hyper: + return r + + return func0(z0) + + +def hyperexpand(f, allow_hyper=False, rewrite='default', place=None): + """ + Expand hypergeometric functions. If allow_hyper is True, allow partial + simplification (that is a result different from input, + but still containing hypergeometric functions). + + If a G-function has expansions both at zero and at infinity, + ``place`` can be set to ``0`` or ``zoo`` to indicate the + preferred choice. + + Examples + ======== + + >>> from sympy.simplify.hyperexpand import hyperexpand + >>> from sympy.functions import hyper + >>> from sympy.abc import z + >>> hyperexpand(hyper([], [], z)) + exp(z) + + Non-hyperegeometric parts of the expression and hypergeometric expressions + that are not recognised are left unchanged: + + >>> hyperexpand(1 + hyper([1, 1, 1], [], z)) + hyper((1, 1, 1), (), z) + 1 + """ + f = sympify(f) + + def do_replace(ap, bq, z): + r = _hyperexpand(Hyper_Function(ap, bq), z, rewrite=rewrite) + if r is None: + return hyper(ap, bq, z) + else: + return r + + def do_meijer(ap, bq, z): + r = _meijergexpand(G_Function(ap[0], ap[1], bq[0], bq[1]), z, + allow_hyper, rewrite=rewrite, place=place) + if not r.has(nan, zoo, oo, -oo): + return r + return f.replace(hyper, do_replace).replace(meijerg, do_meijer) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand_doc.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand_doc.py new file mode 100644 index 0000000000000000000000000000000000000000..a18377f3aede5214036fbf628825536611001584 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/hyperexpand_doc.py @@ -0,0 +1,18 @@ +""" This module cooks up a docstring when imported. Its only purpose is to + be displayed in the sphinx documentation. """ + +from sympy.core.relational import Eq +from sympy.functions.special.hyper import hyper +from sympy.printing.latex import latex +from sympy.simplify.hyperexpand import FormulaCollection + +c = FormulaCollection() + +doc = "" + +for f in c.formulae: + obj = Eq(hyper(f.func.ap, f.func.bq, f.z), + f.closed_form.rewrite('nonrepsmall')) + doc += ".. math::\n %s\n" % latex(obj) + +__doc__ = doc diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/powsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/powsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..f72dfeb072e0d0d4737ace310eda5c2a3a082c16 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/powsimp.py @@ -0,0 +1,718 @@ +from collections import defaultdict +from functools import reduce +from math import prod + +from sympy.core.function import expand_log, count_ops, _coeff_isneg +from sympy.core import sympify, Basic, Dummy, S, Add, Mul, Pow, expand_mul, factor_terms +from sympy.core.sorting import ordered, default_sort_key +from sympy.core.numbers import Integer, Rational, equal_valued +from sympy.core.mul import _keep_coeff +from sympy.core.rules import Transform +from sympy.functions import exp_polar, exp, log, root, polarify, unpolarify +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.polys import lcm, gcd +from sympy.ntheory.factor_ import multiplicity + + + +def powsimp(expr, deep=False, combine='all', force=False, measure=count_ops): + """ + Reduce expression by combining powers with similar bases and exponents. + + Explanation + =========== + + If ``deep`` is ``True`` then powsimp() will also simplify arguments of + functions. By default ``deep`` is set to ``False``. + + If ``force`` is ``True`` then bases will be combined without checking for + assumptions, e.g. sqrt(x)*sqrt(y) -> sqrt(x*y) which is not true + if x and y are both negative. + + You can make powsimp() only combine bases or only combine exponents by + changing combine='base' or combine='exp'. By default, combine='all', + which does both. combine='base' will only combine:: + + a a a 2x x + x * y => (x*y) as well as things like 2 => 4 + + and combine='exp' will only combine + :: + + a b (a + b) + x * x => x + + combine='exp' will strictly only combine exponents in the way that used + to be automatic. Also use deep=True if you need the old behavior. + + When combine='all', 'exp' is evaluated first. Consider the first + example below for when there could be an ambiguity relating to this. + This is done so things like the second example can be completely + combined. If you want 'base' combined first, do something like + powsimp(powsimp(expr, combine='base'), combine='exp'). + + Examples + ======== + + >>> from sympy import powsimp, exp, log, symbols + >>> from sympy.abc import x, y, z, n + >>> powsimp(x**y*x**z*y**z, combine='all') + x**(y + z)*y**z + >>> powsimp(x**y*x**z*y**z, combine='exp') + x**(y + z)*y**z + >>> powsimp(x**y*x**z*y**z, combine='base', force=True) + x**y*(x*y)**z + + >>> powsimp(x**z*x**y*n**z*n**y, combine='all', force=True) + (n*x)**(y + z) + >>> powsimp(x**z*x**y*n**z*n**y, combine='exp') + n**(y + z)*x**(y + z) + >>> powsimp(x**z*x**y*n**z*n**y, combine='base', force=True) + (n*x)**y*(n*x)**z + + >>> x, y = symbols('x y', positive=True) + >>> powsimp(log(exp(x)*exp(y))) + log(exp(x)*exp(y)) + >>> powsimp(log(exp(x)*exp(y)), deep=True) + x + y + + Radicals with Mul bases will be combined if combine='exp' + + >>> from sympy import sqrt + >>> x, y = symbols('x y') + + Two radicals are automatically joined through Mul: + + >>> a=sqrt(x*sqrt(y)) + >>> a*a**3 == a**4 + True + + But if an integer power of that radical has been + autoexpanded then Mul does not join the resulting factors: + + >>> a**4 # auto expands to a Mul, no longer a Pow + x**2*y + >>> _*a # so Mul doesn't combine them + x**2*y*sqrt(x*sqrt(y)) + >>> powsimp(_) # but powsimp will + (x*sqrt(y))**(5/2) + >>> powsimp(x*y*a) # but won't when doing so would violate assumptions + x*y*sqrt(x*sqrt(y)) + + """ + def recurse(arg, **kwargs): + _deep = kwargs.get('deep', deep) + _combine = kwargs.get('combine', combine) + _force = kwargs.get('force', force) + _measure = kwargs.get('measure', measure) + return powsimp(arg, _deep, _combine, _force, _measure) + + expr = sympify(expr) + + if (not isinstance(expr, Basic) or isinstance(expr, MatrixSymbol) or ( + expr.is_Atom or expr in (exp_polar(0), exp_polar(1)))): + return expr + + if deep or expr.is_Add or expr.is_Mul and _y not in expr.args: + expr = expr.func(*[recurse(w) for w in expr.args]) + + if expr.is_Pow: + return recurse(expr*_y, deep=False)/_y + + if not expr.is_Mul: + return expr + + # handle the Mul + if combine in ('exp', 'all'): + # Collect base/exp data, while maintaining order in the + # non-commutative parts of the product + c_powers = defaultdict(list) + nc_part = [] + newexpr = [] + coeff = S.One + for term in expr.args: + if term.is_Rational: + coeff *= term + continue + if term.is_Pow: + term = _denest_pow(term) + if term.is_commutative: + b, e = term.as_base_exp() + if deep: + b, e = [recurse(i) for i in [b, e]] + if b.is_Pow or isinstance(b, exp): + # don't let smthg like sqrt(x**a) split into x**a, 1/2 + # or else it will be joined as x**(a/2) later + b, e = b**e, S.One + c_powers[b].append(e) + else: + # This is the logic that combines exponents for equal, + # but non-commutative bases: A**x*A**y == A**(x+y). + if nc_part: + b1, e1 = nc_part[-1].as_base_exp() + b2, e2 = term.as_base_exp() + if (b1 == b2 and + e1.is_commutative and e2.is_commutative): + nc_part[-1] = Pow(b1, Add(e1, e2)) + continue + nc_part.append(term) + + # add up exponents of common bases + for b, e in ordered(iter(c_powers.items())): + # allow 2**x/4 -> 2**(x - 2); don't do this when b and e are + # Numbers since autoevaluation will undo it, e.g. + # 2**(1/3)/4 -> 2**(1/3 - 2) -> 2**(1/3)/4 + if (b and b.is_Rational and not all(ei.is_Number for ei in e) and \ + coeff is not S.One and + b not in (S.One, S.NegativeOne)): + m = multiplicity(abs(b), abs(coeff)) + if m: + e.append(m) + coeff /= b**m + c_powers[b] = Add(*e) + if coeff is not S.One: + if coeff in c_powers: + c_powers[coeff] += S.One + else: + c_powers[coeff] = S.One + + # convert to plain dictionary + c_powers = dict(c_powers) + + # check for base and inverted base pairs + be = list(c_powers.items()) + skip = set() # skip if we already saw them + for b, e in be: + if b in skip: + continue + bpos = b.is_positive or b.is_polar + if bpos: + binv = 1/b + #Special case for float 1 + if b.is_Float and equal_valued(b, 1): + c_powers[b] = S.One + continue + if b != binv and binv in c_powers: + if b.as_numer_denom()[0] is S.One: + c_powers.pop(b) + c_powers[binv] -= e + else: + skip.add(binv) + e = c_powers.pop(binv) + c_powers[b] -= e + + # check for base and negated base pairs + be = list(c_powers.items()) + _n = S.NegativeOne + for b, e in be: + if (b.is_Symbol or b.is_Add) and -b in c_powers and b in c_powers: + if (b.is_positive is not None or e.is_integer): + if e.is_integer or b.is_negative: + c_powers[-b] += c_powers.pop(b) + else: # (-b).is_positive so use its e + e = c_powers.pop(-b) + c_powers[b] += e + if _n in c_powers: + c_powers[_n] += e + else: + c_powers[_n] = e + + # filter c_powers and convert to a list + c_powers = [(b, e) for b, e in c_powers.items() if e] + + # ============================================================== + # check for Mul bases of Rational powers that can be combined with + # separated bases, e.g. x*sqrt(x*y)*sqrt(x*sqrt(x*y)) -> + # (x*sqrt(x*y))**(3/2) + # ---------------- helper functions + + def ratq(x): + '''Return Rational part of x's exponent as it appears in the bkey. + ''' + return bkey(x)[0][1] + + def bkey(b, e=None): + '''Return (b**s, c.q), c.p where e -> c*s. If e is not given then + it will be taken by using as_base_exp() on the input b. + e.g. + x**3/2 -> (x, 2), 3 + x**y -> (x**y, 1), 1 + x**(2*y/3) -> (x**y, 3), 2 + exp(x/2) -> (exp(a), 2), 1 + + ''' + if e is not None: # coming from c_powers or from below + if e.is_Integer: + return (b, S.One), e + elif e.is_Rational: + return (b, Integer(e.q)), Integer(e.p) + else: + c, m = e.as_coeff_Mul(rational=True) + if c is not S.One: + if m.is_integer: + return (b, Integer(c.q)), m*Integer(c.p) + return (b**m, Integer(c.q)), Integer(c.p) + else: + return (b**e, S.One), S.One + else: + return bkey(*b.as_base_exp()) + + def update(b): + '''Decide what to do with base, b. If its exponent is now an + integer multiple of the Rational denominator, then remove it + and put the factors of its base in the common_b dictionary or + update the existing bases if necessary. If it has been zeroed + out, simply remove the base. + ''' + newe, r = divmod(common_b[b], b[1]) + if not r: + common_b.pop(b) + if newe: + for m in Mul.make_args(b[0]**newe): + b, e = bkey(m) + if b not in common_b: + common_b[b] = 0 + common_b[b] += e + if b[1] != 1: + bases.append(b) + # ---------------- end of helper functions + + # assemble a dictionary of the factors having a Rational power + common_b = {} + done = [] + bases = [] + for b, e in c_powers: + b, e = bkey(b, e) + if b in common_b: + common_b[b] = common_b[b] + e + else: + common_b[b] = e + if b[1] != 1 and b[0].is_Mul: + bases.append(b) + bases.sort(key=default_sort_key) # this makes tie-breaking canonical + bases.sort(key=measure, reverse=True) # handle longest first + for base in bases: + if base not in common_b: # it may have been removed already + continue + b, exponent = base + last = False # True when no factor of base is a radical + qlcm = 1 # the lcm of the radical denominators + while True: + bstart = b + qstart = qlcm + + bb = [] # list of factors + ee = [] # (factor's expo. and it's current value in common_b) + for bi in Mul.make_args(b): + bib, bie = bkey(bi) + if bib not in common_b or common_b[bib] < bie: + ee = bb = [] # failed + break + ee.append([bie, common_b[bib]]) + bb.append(bib) + if ee: + # find the number of integral extractions possible + # e.g. [(1, 2), (2, 2)] -> min(2/1, 2/2) -> 1 + min1 = ee[0][1]//ee[0][0] + for i in range(1, len(ee)): + rat = ee[i][1]//ee[i][0] + if rat < 1: + break + min1 = min(min1, rat) + else: + # update base factor counts + # e.g. if ee = [(2, 5), (3, 6)] then min1 = 2 + # and the new base counts will be 5-2*2 and 6-2*3 + for i in range(len(bb)): + common_b[bb[i]] -= min1*ee[i][0] + update(bb[i]) + # update the count of the base + # e.g. x**2*y*sqrt(x*sqrt(y)) the count of x*sqrt(y) + # will increase by 4 to give bkey (x*sqrt(y), 2, 5) + common_b[base] += min1*qstart*exponent + if (last # no more radicals in base + or len(common_b) == 1 # nothing left to join with + or all(k[1] == 1 for k in common_b) # no rad's in common_b + ): + break + # see what we can exponentiate base by to remove any radicals + # so we know what to search for + # e.g. if base were x**(1/2)*y**(1/3) then we should + # exponentiate by 6 and look for powers of x and y in the ratio + # of 2 to 3 + qlcm = lcm([ratq(bi) for bi in Mul.make_args(bstart)]) + if qlcm == 1: + break # we are done + b = bstart**qlcm + qlcm *= qstart + if all(ratq(bi) == 1 for bi in Mul.make_args(b)): + last = True # we are going to be done after this next pass + # this base no longer can find anything to join with and + # since it was longer than any other we are done with it + b, q = base + done.append((b, common_b.pop(base)*Rational(1, q))) + + # update c_powers and get ready to continue with powsimp + c_powers = done + # there may be terms still in common_b that were bases that were + # identified as needing processing, so remove those, too + for (b, q), e in common_b.items(): + if (b.is_Pow or isinstance(b, exp)) and \ + q is not S.One and not b.exp.is_Rational: + b, be = b.as_base_exp() + b = b**(be/q) + else: + b = root(b, q) + c_powers.append((b, e)) + check = len(c_powers) + c_powers = dict(c_powers) + assert len(c_powers) == check # there should have been no duplicates + # ============================================================== + + # rebuild the expression + newexpr = expr.func(*(newexpr + [Pow(b, e) for b, e in c_powers.items()])) + if combine == 'exp': + return expr.func(newexpr, expr.func(*nc_part)) + else: + return recurse(expr.func(*nc_part), combine='base') * \ + recurse(newexpr, combine='base') + + elif combine == 'base': + + # Build c_powers and nc_part. These must both be lists not + # dicts because exp's are not combined. + c_powers = [] + nc_part = [] + for term in expr.args: + if term.is_commutative: + c_powers.append(list(term.as_base_exp())) + else: + nc_part.append(term) + + # Pull out numerical coefficients from exponent if assumptions allow + # e.g., 2**(2*x) => 4**x + for i in range(len(c_powers)): + b, e = c_powers[i] + if not (all(x.is_nonnegative for x in b.as_numer_denom()) or e.is_integer or force or b.is_polar): + continue + exp_c, exp_t = e.as_coeff_Mul(rational=True) + if exp_c is not S.One and exp_t is not S.One: + c_powers[i] = [Pow(b, exp_c), exp_t] + + # Combine bases whenever they have the same exponent and + # assumptions allow + # first gather the potential bases under the common exponent + c_exp = defaultdict(list) + for b, e in c_powers: + if deep: + e = recurse(e) + if e.is_Add and (b.is_positive or e.is_integer): + e = factor_terms(e) + if _coeff_isneg(e): + e = -e + b = 1/b + c_exp[e].append(b) + del c_powers + + # Merge back in the results of the above to form a new product + c_powers = defaultdict(list) + for e in c_exp: + bases = c_exp[e] + + # calculate the new base for e + + if len(bases) == 1: + new_base = bases[0] + elif e.is_integer or force: + new_base = expr.func(*bases) + else: + # see which ones can be joined + unk = [] + nonneg = [] + neg = [] + for bi in bases: + if bi.is_negative: + neg.append(bi) + elif bi.is_nonnegative: + nonneg.append(bi) + elif bi.is_polar: + nonneg.append( + bi) # polar can be treated like non-negative + else: + unk.append(bi) + if len(unk) == 1 and not neg or len(neg) == 1 and not unk: + # a single neg or a single unk can join the rest + nonneg.extend(unk + neg) + unk = neg = [] + elif neg: + # their negative signs cancel in groups of 2*q if we know + # that e = p/q else we have to treat them as unknown + israt = False + if e.is_Rational: + israt = True + else: + p, d = e.as_numer_denom() + if p.is_integer and d.is_integer: + israt = True + if israt: + neg = [-w for w in neg] + unk.extend([S.NegativeOne]*len(neg)) + else: + unk.extend(neg) + neg = [] + del israt + + # these shouldn't be joined + for b in unk: + c_powers[b].append(e) + # here is a new joined base + new_base = expr.func(*(nonneg + neg)) + # if there are positive parts they will just get separated + # again unless some change is made + + def _terms(e): + # return the number of terms of this expression + # when multiplied out -- assuming no joining of terms + if e.is_Add: + return sum(_terms(ai) for ai in e.args) + if e.is_Mul: + return prod([_terms(mi) for mi in e.args]) + return 1 + xnew_base = expand_mul(new_base, deep=False) + if len(Add.make_args(xnew_base)) < _terms(new_base): + new_base = factor_terms(xnew_base) + + c_powers[new_base].append(e) + + # break out the powers from c_powers now + c_part = [Pow(b, ei) for b, e in c_powers.items() for ei in e] + + # we're done + return expr.func(*(c_part + nc_part)) + + else: + raise ValueError("combine must be one of ('all', 'exp', 'base').") + + +def powdenest(eq, force=False, polar=False): + r""" + Collect exponents on powers as assumptions allow. + + Explanation + =========== + + Given ``(bb**be)**e``, this can be simplified as follows: + * if ``bb`` is positive, or + * ``e`` is an integer, or + * ``|be| < 1`` then this simplifies to ``bb**(be*e)`` + + Given a product of powers raised to a power, ``(bb1**be1 * + bb2**be2...)**e``, simplification can be done as follows: + + - if e is positive, the gcd of all bei can be joined with e; + - all non-negative bb can be separated from those that are negative + and their gcd can be joined with e; autosimplification already + handles this separation. + - integer factors from powers that have integers in the denominator + of the exponent can be removed from any term and the gcd of such + integers can be joined with e + + Setting ``force`` to ``True`` will make symbols that are not explicitly + negative behave as though they are positive, resulting in more + denesting. + + Setting ``polar`` to ``True`` will do simplifications on the Riemann surface of + the logarithm, also resulting in more denestings. + + When there are sums of logs in exp() then a product of powers may be + obtained e.g. ``exp(3*(log(a) + 2*log(b)))`` - > ``a**3*b**6``. + + Examples + ======== + + >>> from sympy.abc import a, b, x, y, z + >>> from sympy import Symbol, exp, log, sqrt, symbols, powdenest + + >>> powdenest((x**(2*a/3))**(3*x)) + (x**(2*a/3))**(3*x) + >>> powdenest(exp(3*x*log(2))) + 2**(3*x) + + Assumptions may prevent expansion: + + >>> powdenest(sqrt(x**2)) + sqrt(x**2) + + >>> p = symbols('p', positive=True) + >>> powdenest(sqrt(p**2)) + p + + No other expansion is done. + + >>> i, j = symbols('i,j', integer=True) + >>> powdenest((x**x)**(i + j)) # -X-> (x**x)**i*(x**x)**j + x**(x*(i + j)) + + But exp() will be denested by moving all non-log terms outside of + the function; this may result in the collapsing of the exp to a power + with a different base: + + >>> powdenest(exp(3*y*log(x))) + x**(3*y) + >>> powdenest(exp(y*(log(a) + log(b)))) + (a*b)**y + >>> powdenest(exp(3*(log(a) + log(b)))) + a**3*b**3 + + If assumptions allow, symbols can also be moved to the outermost exponent: + + >>> i = Symbol('i', integer=True) + >>> powdenest(((x**(2*i))**(3*y))**x) + ((x**(2*i))**(3*y))**x + >>> powdenest(((x**(2*i))**(3*y))**x, force=True) + x**(6*i*x*y) + + >>> powdenest(((x**(2*a/3))**(3*y/i))**x) + ((x**(2*a/3))**(3*y/i))**x + >>> powdenest((x**(2*i)*y**(4*i))**z, force=True) + (x*y**2)**(2*i*z) + + >>> n = Symbol('n', negative=True) + + >>> powdenest((x**i)**y, force=True) + x**(i*y) + >>> powdenest((n**i)**x, force=True) + (n**i)**x + + """ + from sympy.simplify.simplify import posify + + if force: + def _denest(b, e): + if not isinstance(b, (Pow, exp)): + return b.is_positive, Pow(b, e, evaluate=False) + return _denest(b.base, b.exp*e) + reps = [] + for p in eq.atoms(Pow, exp): + if isinstance(p.base, (Pow, exp)): + ok, dp = _denest(*p.args) + if ok is not False: + reps.append((p, dp)) + if reps: + eq = eq.subs(reps) + eq, reps = posify(eq) + return powdenest(eq, force=False, polar=polar).xreplace(reps) + + if polar: + eq, rep = polarify(eq) + return unpolarify(powdenest(unpolarify(eq, exponents_only=True)), rep) + + new = powsimp(eq) + return new.xreplace(Transform( + _denest_pow, filter=lambda m: m.is_Pow or isinstance(m, exp))) + +_y = Dummy('y') + + +def _denest_pow(eq): + """ + Denest powers. + + This is a helper function for powdenest that performs the actual + transformation. + """ + from sympy.simplify.simplify import logcombine + + b, e = eq.as_base_exp() + if b.is_Pow or isinstance(b, exp) and e != 1: + new = b._eval_power(e) + if new is not None: + eq = new + b, e = new.as_base_exp() + + # denest exp with log terms in exponent + if b is S.Exp1 and e.is_Mul: + logs = [] + other = [] + for ei in e.args: + if any(isinstance(ai, log) for ai in Add.make_args(ei)): + logs.append(ei) + else: + other.append(ei) + logs = logcombine(Mul(*logs)) + return Pow(exp(logs), Mul(*other)) + + _, be = b.as_base_exp() + if be is S.One and not (b.is_Mul or + b.is_Rational and b.q != 1 or + b.is_positive): + return eq + + # denest eq which is either pos**e or Pow**e or Mul**e or + # Mul(b1**e1, b2**e2) + + # handle polar numbers specially + polars, nonpolars = [], [] + for bb in Mul.make_args(b): + if bb.is_polar: + polars.append(bb.as_base_exp()) + else: + nonpolars.append(bb) + if len(polars) == 1 and not polars[0][0].is_Mul: + return Pow(polars[0][0], polars[0][1]*e)*powdenest(Mul(*nonpolars)**e) + elif polars: + return Mul(*[powdenest(bb**(ee*e)) for (bb, ee) in polars]) \ + *powdenest(Mul(*nonpolars)**e) + + if b.is_Integer: + # use log to see if there is a power here + logb = expand_log(log(b)) + if logb.is_Mul: + c, logb = logb.args + e *= c + base = logb.args[0] + return Pow(base, e) + + # if b is not a Mul or any factor is an atom then there is nothing to do + if not b.is_Mul or any(s.is_Atom for s in Mul.make_args(b)): + return eq + + # let log handle the case of the base of the argument being a Mul, e.g. + # sqrt(x**(2*i)*y**(6*i)) -> x**i*y**(3**i) if x and y are positive; we + # will take the log, expand it, and then factor out the common powers that + # now appear as coefficient. We do this manually since terms_gcd pulls out + # fractions, terms_gcd(x+x*y/2) -> x*(y + 2)/2 and we don't want the 1/2; + # gcd won't pull out numerators from a fraction: gcd(3*x, 9*x/2) -> x but + # we want 3*x. Neither work with noncommutatives. + + def nc_gcd(aa, bb): + a, b = [i.as_coeff_Mul() for i in [aa, bb]] + c = gcd(a[0], b[0]).as_numer_denom()[0] + g = Mul(*(a[1].args_cnc(cset=True)[0] & b[1].args_cnc(cset=True)[0])) + return _keep_coeff(c, g) + + glogb = expand_log(log(b)) + if glogb.is_Add: + args = glogb.args + g = reduce(nc_gcd, args) + if g != 1: + cg, rg = g.as_coeff_Mul() + glogb = _keep_coeff(cg, rg*Add(*[a/g for a in args])) + + # now put the log back together again + if isinstance(glogb, log) or not glogb.is_Mul: + if glogb.args[0].is_Pow or isinstance(glogb.args[0], exp): + glogb = _denest_pow(glogb.args[0]) + if (abs(glogb.exp) < 1) == True: + return Pow(glogb.base, glogb.exp*e) + return eq + + # the log(b) was a Mul so join any adds with logcombine + add = [] + other = [] + for a in glogb.args: + if a.is_Add: + add.append(a) + else: + other.append(a) + return Pow(exp(logcombine(Mul(*add))), e*Mul(*other)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/radsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/radsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..c878168ebfbc29fc632577d6325befc120c26f56 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/radsimp.py @@ -0,0 +1,1234 @@ +from collections import defaultdict + +from sympy.core import sympify, S, Mul, Derivative, Pow +from sympy.core.add import _unevaluated_Add, Add +from sympy.core.assumptions import assumptions +from sympy.core.exprtools import Factors, gcd_terms +from sympy.core.function import _mexpand, expand_mul, expand_power_base +from sympy.core.mul import _keep_coeff, _unevaluated_Mul, _mulsort +from sympy.core.numbers import Rational, zoo, nan +from sympy.core.parameters import global_parameters +from sympy.core.sorting import ordered, default_sort_key +from sympy.core.symbol import Dummy, Wild, symbols +from sympy.functions import exp, sqrt, log +from sympy.functions.elementary.complexes import Abs +from sympy.polys import gcd +from sympy.simplify.sqrtdenest import sqrtdenest +from sympy.utilities.iterables import iterable, sift + + + + +def collect(expr, syms, func=None, evaluate=None, exact=False, distribute_order_term=True): + """ + Collect additive terms of an expression. + + Explanation + =========== + + This function collects additive terms of an expression with respect + to a list of expression up to powers with rational exponents. By the + term symbol here are meant arbitrary expressions, which can contain + powers, products, sums etc. In other words symbol is a pattern which + will be searched for in the expression's terms. + + The input expression is not expanded by :func:`collect`, so user is + expected to provide an expression in an appropriate form. This makes + :func:`collect` more predictable as there is no magic happening behind the + scenes. However, it is important to note, that powers of products are + converted to products of powers using the :func:`~.expand_power_base` + function. + + There are two possible types of output. First, if ``evaluate`` flag is + set, this function will return an expression with collected terms or + else it will return a dictionary with expressions up to rational powers + as keys and collected coefficients as values. + + Examples + ======== + + >>> from sympy import S, collect, expand, factor, Wild + >>> from sympy.abc import a, b, c, x, y + + This function can collect symbolic coefficients in polynomials or + rational expressions. It will manage to find all integer or rational + powers of collection variable:: + + >>> collect(a*x**2 + b*x**2 + a*x - b*x + c, x) + c + x**2*(a + b) + x*(a - b) + + The same result can be achieved in dictionary form:: + + >>> d = collect(a*x**2 + b*x**2 + a*x - b*x + c, x, evaluate=False) + >>> d[x**2] + a + b + >>> d[x] + a - b + >>> d[S.One] + c + + You can also work with multivariate polynomials. However, remember that + this function is greedy so it will care only about a single symbol at time, + in specification order:: + + >>> collect(x**2 + y*x**2 + x*y + y + a*y, [x, y]) + x**2*(y + 1) + x*y + y*(a + 1) + + Also more complicated expressions can be used as patterns:: + + >>> from sympy import sin, log + >>> collect(a*sin(2*x) + b*sin(2*x), sin(2*x)) + (a + b)*sin(2*x) + + >>> collect(a*x*log(x) + b*(x*log(x)), x*log(x)) + x*(a + b)*log(x) + + You can use wildcards in the pattern:: + + >>> w = Wild('w1') + >>> collect(a*x**y - b*x**y, w**y) + x**y*(a - b) + + It is also possible to work with symbolic powers, although it has more + complicated behavior, because in this case power's base and symbolic part + of the exponent are treated as a single symbol:: + + >>> collect(a*x**c + b*x**c, x) + a*x**c + b*x**c + >>> collect(a*x**c + b*x**c, x**c) + x**c*(a + b) + + However if you incorporate rationals to the exponents, then you will get + well known behavior:: + + >>> collect(a*x**(2*c) + b*x**(2*c), x**c) + x**(2*c)*(a + b) + + Note also that all previously stated facts about :func:`collect` function + apply to the exponential function, so you can get:: + + >>> from sympy import exp + >>> collect(a*exp(2*x) + b*exp(2*x), exp(x)) + (a + b)*exp(2*x) + + If you are interested only in collecting specific powers of some symbols + then set ``exact`` flag to True:: + + >>> collect(a*x**7 + b*x**7, x, exact=True) + a*x**7 + b*x**7 + >>> collect(a*x**7 + b*x**7, x**7, exact=True) + x**7*(a + b) + + If you want to collect on any object containing symbols, set + ``exact`` to None: + + >>> collect(x*exp(x) + sin(x)*y + sin(x)*2 + 3*x, x, exact=None) + x*exp(x) + 3*x + (y + 2)*sin(x) + >>> collect(a*x*y + x*y + b*x + x, [x, y], exact=None) + x*y*(a + 1) + x*(b + 1) + + You can also apply this function to differential equations, where + derivatives of arbitrary order can be collected. Note that if you + collect with respect to a function or a derivative of a function, all + derivatives of that function will also be collected. Use + ``exact=True`` to prevent this from happening:: + + >>> from sympy import Derivative as D, collect, Function + >>> f = Function('f') (x) + + >>> collect(a*D(f,x) + b*D(f,x), D(f,x)) + (a + b)*Derivative(f(x), x) + + >>> collect(a*D(D(f,x),x) + b*D(D(f,x),x), f) + (a + b)*Derivative(f(x), (x, 2)) + + >>> collect(a*D(D(f,x),x) + b*D(D(f,x),x), D(f,x), exact=True) + a*Derivative(f(x), (x, 2)) + b*Derivative(f(x), (x, 2)) + + >>> collect(a*D(f,x) + b*D(f,x) + a*f + b*f, f) + (a + b)*f(x) + (a + b)*Derivative(f(x), x) + + Or you can even match both derivative order and exponent at the same time:: + + >>> collect(a*D(D(f,x),x)**2 + b*D(D(f,x),x)**2, D(f,x)) + (a + b)*Derivative(f(x), (x, 2))**2 + + Finally, you can apply a function to each of the collected coefficients. + For example you can factorize symbolic coefficients of polynomial:: + + >>> f = expand((x + a + 1)**3) + + >>> collect(f, x, factor) + x**3 + 3*x**2*(a + 1) + 3*x*(a + 1)**2 + (a + 1)**3 + + .. note:: Arguments are expected to be in expanded form, so you might have + to call :func:`~.expand` prior to calling this function. + + See Also + ======== + + collect_const, collect_sqrt, rcollect + """ + expr = sympify(expr) + syms = [sympify(i) for i in (syms if iterable(syms) else [syms])] + + # replace syms[i] if it is not x, -x or has Wild symbols + cond = lambda x: x.is_Symbol or (-x).is_Symbol or bool( + x.atoms(Wild)) + _, nonsyms = sift(syms, cond, binary=True) + if nonsyms: + reps = dict(zip(nonsyms, [Dummy(**assumptions(i)) for i in nonsyms])) + syms = [reps.get(s, s) for s in syms] + rv = collect(expr.subs(reps), syms, + func=func, evaluate=evaluate, exact=exact, + distribute_order_term=distribute_order_term) + urep = {v: k for k, v in reps.items()} + if not isinstance(rv, dict): + return rv.xreplace(urep) + else: + return {urep.get(k, k).xreplace(urep): v.xreplace(urep) + for k, v in rv.items()} + + # see if other expressions should be considered + if exact is None: + _syms = set() + for i in Add.make_args(expr): + if not i.has_free(*syms) or i in syms: + continue + if not i.is_Mul and i not in syms: + _syms.add(i) + else: + # identify compound generators + g = i._new_rawargs(*i.as_coeff_mul(*syms)[1]) + if g not in syms: + _syms.add(g) + simple = all(i.is_Pow and i.base in syms for i in _syms) + syms = syms + list(ordered(_syms)) + if not simple: + return collect(expr, syms, + func=func, evaluate=evaluate, exact=False, + distribute_order_term=distribute_order_term) + + if evaluate is None: + evaluate = global_parameters.evaluate + + def make_expression(terms): + product = [] + + for term, rat, sym, deriv in terms: + if deriv is not None: + var, order = deriv + for _ in range(order): + term = Derivative(term, var) + + if sym is None: + if rat is S.One: + product.append(term) + else: + product.append(Pow(term, rat)) + else: + product.append(Pow(term, rat*sym)) + + return Mul(*product) + + def parse_derivative(deriv): + # scan derivatives tower in the input expression and return + # underlying function and maximal differentiation order + expr, sym, order = deriv.expr, deriv.variables[0], 1 + + for s in deriv.variables[1:]: + if s == sym: + order += 1 + else: + raise NotImplementedError( + 'Improve MV Derivative support in collect') + + while isinstance(expr, Derivative): + s0 = expr.variables[0] + + if any(s != s0 for s in expr.variables): + raise NotImplementedError( + 'Improve MV Derivative support in collect') + + if s0 == sym: + expr, order = expr.expr, order + len(expr.variables) + else: + break + + return expr, (sym, Rational(order)) + + def parse_term(expr): + """Parses expression expr and outputs tuple (sexpr, rat_expo, + sym_expo, deriv) + where: + - sexpr is the base expression + - rat_expo is the rational exponent that sexpr is raised to + - sym_expo is the symbolic exponent that sexpr is raised to + - deriv contains the derivatives of the expression + + For example, the output of x would be (x, 1, None, None) + the output of 2**x would be (2, 1, x, None). + """ + rat_expo, sym_expo = S.One, None + sexpr, deriv = expr, None + + if expr.is_Pow: + if isinstance(expr.base, Derivative): + sexpr, deriv = parse_derivative(expr.base) + else: + sexpr = expr.base + + if expr.base == S.Exp1: + arg = expr.exp + if arg.is_Rational: + sexpr, rat_expo = S.Exp1, arg + elif arg.is_Mul: + coeff, tail = arg.as_coeff_Mul(rational=True) + sexpr, rat_expo = exp(tail), coeff + + elif expr.exp.is_Number: + rat_expo = expr.exp + else: + coeff, tail = expr.exp.as_coeff_Mul() + + if coeff.is_Number: + rat_expo, sym_expo = coeff, tail + else: + sym_expo = expr.exp + elif isinstance(expr, exp): + arg = expr.exp + if arg.is_Rational: + sexpr, rat_expo = S.Exp1, arg + elif arg.is_Mul: + coeff, tail = arg.as_coeff_Mul(rational=True) + sexpr, rat_expo = exp(tail), coeff + elif isinstance(expr, Derivative): + sexpr, deriv = parse_derivative(expr) + + return sexpr, rat_expo, sym_expo, deriv + + def parse_expression(terms, pattern): + """Parse terms searching for a pattern. + Terms is a list of tuples as returned by parse_terms; + Pattern is an expression treated as a product of factors. + """ + pattern = Mul.make_args(pattern) + + if len(terms) < len(pattern): + # pattern is longer than matched product + # so no chance for positive parsing result + return None + else: + pattern = [parse_term(elem) for elem in pattern] + + terms = terms[:] # need a copy + elems, common_expo, has_deriv = [], None, False + + for elem, e_rat, e_sym, e_ord in pattern: + + if elem.is_Number and e_rat == 1 and e_sym is None: + # a constant is a match for everything + continue + + for j in range(len(terms)): + if terms[j] is None: + continue + + term, t_rat, t_sym, t_ord = terms[j] + + # keeping track of whether one of the terms had + # a derivative or not as this will require rebuilding + # the expression later + if t_ord is not None: + has_deriv = True + + if (term.match(elem) is not None and + (t_sym == e_sym or t_sym is not None and + e_sym is not None and + t_sym.match(e_sym) is not None)): + if exact is False: + # we don't have to be exact so find common exponent + # for both expression's term and pattern's element + expo = t_rat / e_rat + + if common_expo is None: + # first time + common_expo = expo + else: + # common exponent was negotiated before so + # there is no chance for a pattern match unless + # common and current exponents are equal + if common_expo != expo: + common_expo = 1 + else: + # we ought to be exact so all fields of + # interest must match in every details + if e_rat != t_rat or e_ord != t_ord: + continue + + # found common term so remove it from the expression + # and try to match next element in the pattern + elems.append(terms[j]) + terms[j] = None + + break + + else: + # pattern element not found + return None + + return [_f for _f in terms if _f], elems, common_expo, has_deriv + + if evaluate: + if expr.is_Add: + o = expr.getO() or 0 + expr = expr.func(*[ + collect(a, syms, func, True, exact, distribute_order_term) + for a in expr.args if a != o]) + o + elif expr.is_Mul: + return expr.func(*[ + collect(term, syms, func, True, exact, distribute_order_term) + for term in expr.args]) + elif expr.is_Pow: + b = collect( + expr.base, syms, func, True, exact, distribute_order_term) + return Pow(b, expr.exp) + + syms = [expand_power_base(i, deep=False) for i in syms] + + order_term = None + + if distribute_order_term: + order_term = expr.getO() + + if order_term is not None: + if order_term.has(*syms): + order_term = None + else: + expr = expr.removeO() + + summa = [expand_power_base(i, deep=False) for i in Add.make_args(expr)] + + collected, disliked = defaultdict(list), S.Zero + for product in summa: + c, nc = product.args_cnc(split_1=False) + args = list(ordered(c)) + nc + terms = [parse_term(i) for i in args] + small_first = True + + for symbol in syms: + if isinstance(symbol, Derivative) and small_first: + terms = list(reversed(terms)) + small_first = not small_first + result = parse_expression(terms, symbol) + + if result is not None: + if not symbol.is_commutative: + raise AttributeError("Can not collect noncommutative symbol") + + terms, elems, common_expo, has_deriv = result + + # when there was derivative in current pattern we + # will need to rebuild its expression from scratch + if not has_deriv: + margs = [] + for elem in elems: + if elem[2] is None: + e = elem[1] + else: + e = elem[1]*elem[2] + margs.append(Pow(elem[0], e)) + index = Mul(*margs) + else: + index = make_expression(elems) + terms = expand_power_base(make_expression(terms), deep=False) + index = expand_power_base(index, deep=False) + collected[index].append(terms) + break + else: + # none of the patterns matched + disliked += product + # add terms now for each key + collected = {k: Add(*v) for k, v in collected.items()} + + if disliked is not S.Zero: + collected[S.One] = disliked + + if order_term is not None: + for key, val in collected.items(): + collected[key] = val + order_term + + if func is not None: + collected = { + key: func(val) for key, val in collected.items()} + + if evaluate: + return Add(*[key*val for key, val in collected.items()]) + else: + return collected + + +def rcollect(expr, *vars): + """ + Recursively collect sums in an expression. + + Examples + ======== + + >>> from sympy.simplify import rcollect + >>> from sympy.abc import x, y + + >>> expr = (x**2*y + x*y + x + y)/(x + y) + + >>> rcollect(expr, y) + (x + y*(x**2 + x + 1))/(x + y) + + See Also + ======== + + collect, collect_const, collect_sqrt + """ + if expr.is_Atom or not expr.has(*vars): + return expr + else: + expr = expr.__class__(*[rcollect(arg, *vars) for arg in expr.args]) + + if expr.is_Add: + return collect(expr, vars) + else: + return expr + + +def collect_sqrt(expr, evaluate=None): + """Return expr with terms having common square roots collected together. + If ``evaluate`` is False a count indicating the number of sqrt-containing + terms will be returned and, if non-zero, the terms of the Add will be + returned, else the expression itself will be returned as a single term. + If ``evaluate`` is True, the expression with any collected terms will be + returned. + + Note: since I = sqrt(-1), it is collected, too. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.radsimp import collect_sqrt + >>> from sympy.abc import a, b + + >>> r2, r3, r5 = [sqrt(i) for i in [2, 3, 5]] + >>> collect_sqrt(a*r2 + b*r2) + sqrt(2)*(a + b) + >>> collect_sqrt(a*r2 + b*r2 + a*r3 + b*r3) + sqrt(2)*(a + b) + sqrt(3)*(a + b) + >>> collect_sqrt(a*r2 + b*r2 + a*r3 + b*r5) + sqrt(3)*a + sqrt(5)*b + sqrt(2)*(a + b) + + If evaluate is False then the arguments will be sorted and + returned as a list and a count of the number of sqrt-containing + terms will be returned: + + >>> collect_sqrt(a*r2 + b*r2 + a*r3 + b*r5, evaluate=False) + ((sqrt(3)*a, sqrt(5)*b, sqrt(2)*(a + b)), 3) + >>> collect_sqrt(a*sqrt(2) + b, evaluate=False) + ((b, sqrt(2)*a), 1) + >>> collect_sqrt(a + b, evaluate=False) + ((a + b,), 0) + + See Also + ======== + + collect, collect_const, rcollect + """ + if evaluate is None: + evaluate = global_parameters.evaluate + # this step will help to standardize any complex arguments + # of sqrts + coeff, expr = expr.as_content_primitive() + vars = set() + for a in Add.make_args(expr): + for m in a.args_cnc()[0]: + if m.is_number and ( + m.is_Pow and m.exp.is_Rational and m.exp.q == 2 or + m is S.ImaginaryUnit): + vars.add(m) + + # we only want radicals, so exclude Number handling; in this case + # d will be evaluated + d = collect_const(expr, *vars, Numbers=False) + hit = expr != d + + if not evaluate: + nrad = 0 + # make the evaluated args canonical + args = list(ordered(Add.make_args(d))) + for i, m in enumerate(args): + c, nc = m.args_cnc() + for ci in c: + # XXX should this be restricted to ci.is_number as above? + if ci.is_Pow and ci.exp.is_Rational and ci.exp.q == 2 or \ + ci is S.ImaginaryUnit: + nrad += 1 + break + args[i] *= coeff + if not (hit or nrad): + args = [Add(*args)] + return tuple(args), nrad + + return coeff*d + + +def collect_abs(expr): + """Return ``expr`` with arguments of multiple Abs in a term collected + under a single instance. + + Examples + ======== + + >>> from sympy.simplify.radsimp import collect_abs + >>> from sympy.abc import x + >>> collect_abs(abs(x + 1)/abs(x**2 - 1)) + Abs((x + 1)/(x**2 - 1)) + >>> collect_abs(abs(1/x)) + Abs(1/x) + """ + def _abs(mul): + c, nc = mul.args_cnc() + a = [] + o = [] + for i in c: + if isinstance(i, Abs): + a.append(i.args[0]) + elif isinstance(i, Pow) and isinstance(i.base, Abs) and i.exp.is_real: + a.append(i.base.args[0]**i.exp) + else: + o.append(i) + if len(a) < 2 and not any(i.exp.is_negative for i in a if isinstance(i, Pow)): + return mul + absarg = Mul(*a) + A = Abs(absarg) + args = [A] + args.extend(o) + if not A.has(Abs): + args.extend(nc) + return Mul(*args) + if not isinstance(A, Abs): + # reevaluate and make it unevaluated + A = Abs(absarg, evaluate=False) + args[0] = A + _mulsort(args) + args.extend(nc) # nc always go last + return Mul._from_args(args, is_commutative=not nc) + + return expr.replace( + lambda x: isinstance(x, Mul), + lambda x: _abs(x)).replace( + lambda x: isinstance(x, Pow), + lambda x: _abs(x)) + + +def collect_const(expr, *vars, Numbers=True): + """A non-greedy collection of terms with similar number coefficients in + an Add expr. If ``vars`` is given then only those constants will be + targeted. Although any Number can also be targeted, if this is not + desired set ``Numbers=False`` and no Float or Rational will be collected. + + Parameters + ========== + + expr : SymPy expression + This parameter defines the expression the expression from which + terms with similar coefficients are to be collected. A non-Add + expression is returned as it is. + + vars : variable length collection of Numbers, optional + Specifies the constants to target for collection. Can be multiple in + number. + + Numbers : bool + Specifies to target all instance of + :class:`sympy.core.numbers.Number` class. If ``Numbers=False``, then + no Float or Rational will be collected. + + Returns + ======= + + expr : Expr + Returns an expression with similar coefficient terms collected. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import s, x, y, z + >>> from sympy.simplify.radsimp import collect_const + >>> collect_const(sqrt(3) + sqrt(3)*(1 + sqrt(2))) + sqrt(3)*(sqrt(2) + 2) + >>> collect_const(sqrt(3)*s + sqrt(7)*s + sqrt(3) + sqrt(7)) + (sqrt(3) + sqrt(7))*(s + 1) + >>> s = sqrt(2) + 2 + >>> collect_const(sqrt(3)*s + sqrt(3) + sqrt(7)*s + sqrt(7)) + (sqrt(2) + 3)*(sqrt(3) + sqrt(7)) + >>> collect_const(sqrt(3)*s + sqrt(3) + sqrt(7)*s + sqrt(7), sqrt(3)) + sqrt(7) + sqrt(3)*(sqrt(2) + 3) + sqrt(7)*(sqrt(2) + 2) + + The collection is sign-sensitive, giving higher precedence to the + unsigned values: + + >>> collect_const(x - y - z) + x - (y + z) + >>> collect_const(-y - z) + -(y + z) + >>> collect_const(2*x - 2*y - 2*z, 2) + 2*(x - y - z) + >>> collect_const(2*x - 2*y - 2*z, -2) + 2*x - 2*(y + z) + + See Also + ======== + + collect, collect_sqrt, rcollect + """ + if not expr.is_Add: + return expr + + recurse = False + + if not vars: + recurse = True + vars = set() + for a in expr.args: + for m in Mul.make_args(a): + if m.is_number: + vars.add(m) + else: + vars = sympify(vars) + if not Numbers: + vars = [v for v in vars if not v.is_Number] + + vars = list(ordered(vars)) + for v in vars: + terms = defaultdict(list) + Fv = Factors(v) + for m in Add.make_args(expr): + f = Factors(m) + q, r = f.div(Fv) + if r.is_one: + # only accept this as a true factor if + # it didn't change an exponent from an Integer + # to a non-Integer, e.g. 2/sqrt(2) -> sqrt(2) + # -- we aren't looking for this sort of change + fwas = f.factors.copy() + fnow = q.factors + if not any(k in fwas and fwas[k].is_Integer and not + fnow[k].is_Integer for k in fnow): + terms[v].append(q.as_expr()) + continue + terms[S.One].append(m) + + args = [] + hit = False + uneval = False + for k in ordered(terms): + v = terms[k] + if k is S.One: + args.extend(v) + continue + + if len(v) > 1: + v = Add(*v) + hit = True + if recurse and v != expr: + vars.append(v) + else: + v = v[0] + + # be careful not to let uneval become True unless + # it must be because it's going to be more expensive + # to rebuild the expression as an unevaluated one + if Numbers and k.is_Number and v.is_Add: + args.append(_keep_coeff(k, v, sign=True)) + uneval = True + else: + args.append(k*v) + + if hit: + if uneval: + expr = _unevaluated_Add(*args) + else: + expr = Add(*args) + if not expr.is_Add: + break + + return expr + + +def radsimp(expr, symbolic=True, max_terms=4): + r""" + Rationalize the denominator by removing square roots. + + Explanation + =========== + + The expression returned from radsimp must be used with caution + since if the denominator contains symbols, it will be possible to make + substitutions that violate the assumptions of the simplification process: + that for a denominator matching a + b*sqrt(c), a != +/-b*sqrt(c). (If + there are no symbols, this assumptions is made valid by collecting terms + of sqrt(c) so the match variable ``a`` does not contain ``sqrt(c)``.) If + you do not want the simplification to occur for symbolic denominators, set + ``symbolic`` to False. + + If there are more than ``max_terms`` radical terms then the expression is + returned unchanged. + + Examples + ======== + + >>> from sympy import radsimp, sqrt, Symbol, pprint + >>> from sympy import factor_terms, fraction, signsimp + >>> from sympy.simplify.radsimp import collect_sqrt + >>> from sympy.abc import a, b, c + + >>> radsimp(1/(2 + sqrt(2))) + (2 - sqrt(2))/2 + >>> x,y = map(Symbol, 'xy') + >>> e = ((2 + 2*sqrt(2))*x + (2 + sqrt(8))*y)/(2 + sqrt(2)) + >>> radsimp(e) + sqrt(2)*(x + y) + + No simplification beyond removal of the gcd is done. One might + want to polish the result a little, however, by collecting + square root terms: + + >>> r2 = sqrt(2) + >>> r5 = sqrt(5) + >>> ans = radsimp(1/(y*r2 + x*r2 + a*r5 + b*r5)); pprint(ans) + ___ ___ ___ ___ + \/ 5 *a + \/ 5 *b - \/ 2 *x - \/ 2 *y + ------------------------------------------ + 2 2 2 2 + 5*a + 10*a*b + 5*b - 2*x - 4*x*y - 2*y + + >>> n, d = fraction(ans) + >>> pprint(factor_terms(signsimp(collect_sqrt(n))/d, radical=True)) + ___ ___ + \/ 5 *(a + b) - \/ 2 *(x + y) + ------------------------------------------ + 2 2 2 2 + 5*a + 10*a*b + 5*b - 2*x - 4*x*y - 2*y + + If radicals in the denominator cannot be removed or there is no denominator, + the original expression will be returned. + + >>> radsimp(sqrt(2)*x + sqrt(2)) + sqrt(2)*x + sqrt(2) + + Results with symbols will not always be valid for all substitutions: + + >>> eq = 1/(a + b*sqrt(c)) + >>> eq.subs(a, b*sqrt(c)) + 1/(2*b*sqrt(c)) + >>> radsimp(eq).subs(a, b*sqrt(c)) + nan + + If ``symbolic=False``, symbolic denominators will not be transformed (but + numeric denominators will still be processed): + + >>> radsimp(eq, symbolic=False) + 1/(a + b*sqrt(c)) + + """ + from sympy.core.expr import Expr + from sympy.simplify.simplify import signsimp + + syms = symbols("a:d A:D") + def _num(rterms): + # return the multiplier that will simplify the expression described + # by rterms [(sqrt arg, coeff), ... ] + a, b, c, d, A, B, C, D = syms + if len(rterms) == 2: + reps = dict(list(zip([A, a, B, b], [j for i in rterms for j in i]))) + return ( + sqrt(A)*a - sqrt(B)*b).xreplace(reps) + if len(rterms) == 3: + reps = dict(list(zip([A, a, B, b, C, c], [j for i in rterms for j in i]))) + return ( + (sqrt(A)*a + sqrt(B)*b - sqrt(C)*c)*(2*sqrt(A)*sqrt(B)*a*b - A*a**2 - + B*b**2 + C*c**2)).xreplace(reps) + elif len(rterms) == 4: + reps = dict(list(zip([A, a, B, b, C, c, D, d], [j for i in rterms for j in i]))) + return ((sqrt(A)*a + sqrt(B)*b - sqrt(C)*c - sqrt(D)*d)*(2*sqrt(A)*sqrt(B)*a*b + - A*a**2 - B*b**2 - 2*sqrt(C)*sqrt(D)*c*d + C*c**2 + + D*d**2)*(-8*sqrt(A)*sqrt(B)*sqrt(C)*sqrt(D)*a*b*c*d + A**2*a**4 - + 2*A*B*a**2*b**2 - 2*A*C*a**2*c**2 - 2*A*D*a**2*d**2 + B**2*b**4 - + 2*B*C*b**2*c**2 - 2*B*D*b**2*d**2 + C**2*c**4 - 2*C*D*c**2*d**2 + + D**2*d**4)).xreplace(reps) + elif len(rterms) == 1: + return sqrt(rterms[0][0]) + else: + raise NotImplementedError + + def ispow2(d, log2=False): + if not d.is_Pow: + return False + e = d.exp + if e.is_Rational and e.q == 2 or symbolic and denom(e) == 2: + return True + if log2: + q = 1 + if e.is_Rational: + q = e.q + elif symbolic: + d = denom(e) + if d.is_Integer: + q = d + if q != 1 and log(q, 2).is_Integer: + return True + return False + + def handle(expr): + # Handle first reduces to the case + # expr = 1/d, where d is an add, or d is base**p/2. + # We do this by recursively calling handle on each piece. + from sympy.simplify.simplify import nsimplify + + if expr.is_Atom: + return expr + elif not isinstance(expr, Expr): + return expr.func(*[handle(a) for a in expr.args]) + + n, d = fraction(expr) + + if d.is_Atom and n.is_Atom: + return expr + elif not n.is_Atom: + n = n.func(*[handle(a) for a in n.args]) + return _unevaluated_Mul(n, handle(1/d)) + elif n is not S.One: + return _unevaluated_Mul(n, handle(1/d)) + elif d.is_Mul: + return _unevaluated_Mul(*[handle(1/d) for d in d.args]) + + # By this step, expr is 1/d, and d is not a mul. + if not symbolic and d.free_symbols: + return expr + + if ispow2(d): + d2 = sqrtdenest(sqrt(d.base))**numer(d.exp) + if d2 != d: + return handle(1/d2) + elif d.is_Pow and (d.exp.is_integer or d.base.is_positive): + # (1/d**i) = (1/d)**i + return handle(1/d.base)**d.exp + + if not (d.is_Add or ispow2(d)): + return 1/d.func(*[handle(a) for a in d.args]) + + # handle 1/d treating d as an Add (though it may not be) + + keep = True # keep changes that are made + + # flatten it and collect radicals after checking for special + # conditions + d = _mexpand(d) + + # did it change? + if d.is_Atom: + return 1/d + + # is it a number that might be handled easily? + if d.is_number: + _d = nsimplify(d) + if _d.is_Number and _d.equals(d): + return 1/_d + + while True: + # collect similar terms + collected = defaultdict(list) + for m in Add.make_args(d): # d might have become non-Add + p2 = [] + other = [] + for i in Mul.make_args(m): + if ispow2(i, log2=True): + p2.append(i.base if i.exp is S.Half else i.base**(2*i.exp)) + elif i is S.ImaginaryUnit: + p2.append(S.NegativeOne) + else: + other.append(i) + collected[tuple(ordered(p2))].append(Mul(*other)) + rterms = list(ordered(list(collected.items()))) + rterms = [(Mul(*i), Add(*j)) for i, j in rterms] + nrad = len(rterms) - (1 if rterms[0][0] is S.One else 0) + if nrad < 1: + break + elif nrad > max_terms: + # there may have been invalid operations leading to this point + # so don't keep changes, e.g. this expression is troublesome + # in collecting terms so as not to raise the issue of 2834: + # r = sqrt(sqrt(5) + 5) + # eq = 1/(sqrt(5)*r + 2*sqrt(5)*sqrt(-sqrt(5) + 5) + 5*r) + keep = False + break + if len(rterms) > 4: + # in general, only 4 terms can be removed with repeated squaring + # but other considerations can guide selection of radical terms + # so that radicals are removed + if all(x.is_Integer and (y**2).is_Rational for x, y in rterms): + nd, d = rad_rationalize(S.One, Add._from_args( + [sqrt(x)*y for x, y in rterms])) + n *= nd + else: + # is there anything else that might be attempted? + keep = False + break + from sympy.simplify.powsimp import powsimp, powdenest + + num = powsimp(_num(rterms)) + n *= num + d *= num + d = powdenest(_mexpand(d), force=symbolic) + if d.has(S.Zero, nan, zoo): + return expr + if d.is_Atom: + break + + if not keep: + return expr + return _unevaluated_Mul(n, 1/d) + + if not isinstance(expr, Expr): + return expr.func(*[radsimp(a, symbolic=symbolic, max_terms=max_terms) for a in expr.args]) + + coeff, expr = expr.as_coeff_Add() + expr = expr.normal() + old = fraction(expr) + n, d = fraction(handle(expr)) + if old != (n, d): + if not d.is_Atom: + was = (n, d) + n = signsimp(n, evaluate=False) + d = signsimp(d, evaluate=False) + u = Factors(_unevaluated_Mul(n, 1/d)) + u = _unevaluated_Mul(*[k**v for k, v in u.factors.items()]) + n, d = fraction(u) + if old == (n, d): + n, d = was + n = expand_mul(n) + if d.is_Number or d.is_Add: + n2, d2 = fraction(gcd_terms(_unevaluated_Mul(n, 1/d))) + if d2.is_Number or (d2.count_ops() <= d.count_ops()): + n, d = [signsimp(i) for i in (n2, d2)] + if n.is_Mul and n.args[0].is_Number: + n = n.func(*n.args) + + return coeff + _unevaluated_Mul(n, 1/d) + + +def rad_rationalize(num, den): + """ + Rationalize ``num/den`` by removing square roots in the denominator; + num and den are sum of terms whose squares are positive rationals. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.radsimp import rad_rationalize + >>> rad_rationalize(sqrt(3), 1 + sqrt(2)/3) + (-sqrt(3) + sqrt(6)/3, -7/9) + """ + if not den.is_Add: + return num, den + g, a, b = split_surds(den) + a = a*sqrt(g) + num = _mexpand((a - b)*num) + den = _mexpand(a**2 - b**2) + return rad_rationalize(num, den) + + +def fraction(expr, exact=False): + """Returns a pair with expression's numerator and denominator. + If the given expression is not a fraction then this function + will return the tuple (expr, 1). + + This function will not make any attempt to simplify nested + fractions or to do any term rewriting at all. + + If only one of the numerator/denominator pair is needed then + use numer(expr) or denom(expr) functions respectively. + + >>> from sympy import fraction, Rational, Symbol + >>> from sympy.abc import x, y + + >>> fraction(x/y) + (x, y) + >>> fraction(x) + (x, 1) + + >>> fraction(1/y**2) + (1, y**2) + + >>> fraction(x*y/2) + (x*y, 2) + >>> fraction(Rational(1, 2)) + (1, 2) + + This function will also work fine with assumptions: + + >>> k = Symbol('k', negative=True) + >>> fraction(x * y**k) + (x, y**(-k)) + + If we know nothing about sign of some exponent and ``exact`` + flag is unset, then the exponent's structure will + be analyzed and pretty fraction will be returned: + + >>> from sympy import exp, Mul + >>> fraction(2*x**(-y)) + (2, x**y) + + >>> fraction(exp(-x)) + (1, exp(x)) + + >>> fraction(exp(-x), exact=True) + (exp(-x), 1) + + The ``exact`` flag will also keep any unevaluated Muls from + being evaluated: + + >>> u = Mul(2, x + 1, evaluate=False) + >>> fraction(u) + (2*x + 2, 1) + >>> fraction(u, exact=True) + (2*(x + 1), 1) + """ + expr = sympify(expr) + + numer, denom = [], [] + + for term in Mul.make_args(expr): + if term.is_commutative and (term.is_Pow or isinstance(term, exp)): + b, ex = term.as_base_exp() + if ex.is_negative: + if ex is S.NegativeOne: + denom.append(b) + elif exact: + if ex.is_constant(): + denom.append(Pow(b, -ex)) + else: + numer.append(term) + else: + denom.append(Pow(b, -ex)) + elif ex.is_positive: + numer.append(term) + elif not exact and ex.is_Mul: + n, d = term.as_numer_denom() # this will cause evaluation + if n != 1: + numer.append(n) + denom.append(d) + else: + numer.append(term) + elif term.is_Rational and not term.is_Integer: + if term.p != 1: + numer.append(term.p) + denom.append(term.q) + else: + numer.append(term) + return Mul(*numer, evaluate=not exact), Mul(*denom, evaluate=not exact) + + +def numer(expr, exact=False): # default matches fraction's default + return fraction(expr, exact=exact)[0] + + +def denom(expr, exact=False): # default matches fraction's default + return fraction(expr, exact=exact)[1] + + +def fraction_expand(expr, **hints): + return expr.expand(frac=True, **hints) + + +def numer_expand(expr, **hints): + # default matches fraction's default + a, b = fraction(expr, exact=hints.get('exact', False)) + return a.expand(numer=True, **hints) / b + + +def denom_expand(expr, **hints): + # default matches fraction's default + a, b = fraction(expr, exact=hints.get('exact', False)) + return a / b.expand(denom=True, **hints) + + +expand_numer = numer_expand +expand_denom = denom_expand +expand_fraction = fraction_expand + + +def split_surds(expr): + """ + Split an expression with terms whose squares are positive rationals + into a sum of terms whose surds squared have gcd equal to g + and a sum of terms with surds squared prime with g. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.radsimp import split_surds + >>> split_surds(3*sqrt(3) + sqrt(5)/7 + sqrt(6) + sqrt(10) + sqrt(15)) + (3, sqrt(2) + sqrt(5) + 3, sqrt(5)/7 + sqrt(10)) + """ + args = sorted(expr.args, key=default_sort_key) + coeff_muls = [x.as_coeff_Mul() for x in args] + surds = [x[1]**2 for x in coeff_muls if x[1].is_Pow] + surds.sort(key=default_sort_key) + g, b1, b2 = _split_gcd(*surds) + g2 = g + if not b2 and len(b1) >= 2: + b1n = [x/g for x in b1] + b1n = [x for x in b1n if x != 1] + # only a common factor has been factored; split again + g1, b1n, b2 = _split_gcd(*b1n) + g2 = g*g1 + a1v, a2v = [], [] + for c, s in coeff_muls: + if s.is_Pow and s.exp == S.Half: + s1 = s.base + if s1 in b1: + a1v.append(c*sqrt(s1/g2)) + else: + a2v.append(c*s) + else: + a2v.append(c*s) + a = Add(*a1v) + b = Add(*a2v) + return g2, a, b + + +def _split_gcd(*a): + """ + Split the list of integers ``a`` into a list of integers, ``a1`` having + ``g = gcd(a1)``, and a list ``a2`` whose elements are not divisible by + ``g``. Returns ``g, a1, a2``. + + Examples + ======== + + >>> from sympy.simplify.radsimp import _split_gcd + >>> _split_gcd(55, 35, 22, 14, 77, 10) + (5, [55, 35, 10], [22, 14, 77]) + """ + g = a[0] + b1 = [g] + b2 = [] + for x in a[1:]: + g1 = gcd(g, x) + if g1 == 1: + b2.append(x) + else: + g = g1 + b1.append(x) + return g, b1, b2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/ratsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/ratsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..95751fab47f585d3ae2e1289f014fba0f2708224 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/ratsimp.py @@ -0,0 +1,222 @@ +from itertools import combinations_with_replacement +from sympy.core import symbols, Add, Dummy +from sympy.core.numbers import Rational +from sympy.polys import cancel, ComputationFailed, parallel_poly_from_expr, reduced, Poly +from sympy.polys.monomials import Monomial, monomial_div +from sympy.polys.polyerrors import DomainError, PolificationFailed +from sympy.utilities.misc import debug, debugf + +def ratsimp(expr): + """ + Put an expression over a common denominator, cancel and reduce. + + Examples + ======== + + >>> from sympy import ratsimp + >>> from sympy.abc import x, y + >>> ratsimp(1/x + 1/y) + (x + y)/(x*y) + """ + + f, g = cancel(expr).as_numer_denom() + try: + Q, r = reduced(f, [g], field=True, expand=False) + except ComputationFailed: + return f/g + + return Add(*Q) + cancel(r/g) + + +def ratsimpmodprime(expr, G, *gens, quick=True, polynomial=False, **args): + """ + Simplifies a rational expression ``expr`` modulo the prime ideal + generated by ``G``. ``G`` should be a Groebner basis of the + ideal. + + Examples + ======== + + >>> from sympy.simplify.ratsimp import ratsimpmodprime + >>> from sympy.abc import x, y + >>> eq = (x + y**5 + y)/(x - y) + >>> ratsimpmodprime(eq, [x*y**5 - x - y], x, y, order='lex') + (-x**2 - x*y - x - y)/(-x**2 + x*y) + + If ``polynomial`` is ``False``, the algorithm computes a rational + simplification which minimizes the sum of the total degrees of + the numerator and the denominator. + + If ``polynomial`` is ``True``, this function just brings numerator and + denominator into a canonical form. This is much faster, but has + potentially worse results. + + References + ========== + + .. [1] M. Monagan, R. Pearce, Rational Simplification Modulo a Polynomial + Ideal, https://dl.acm.org/doi/pdf/10.1145/1145768.1145809 + (specifically, the second algorithm) + """ + from sympy.solvers.solvers import solve + + debug('ratsimpmodprime', expr) + + # usual preparation of polynomials: + + num, denom = cancel(expr).as_numer_denom() + + try: + polys, opt = parallel_poly_from_expr([num, denom] + G, *gens, **args) + except PolificationFailed: + return expr + + domain = opt.domain + + if domain.has_assoc_Field: + opt.domain = domain.get_field() + else: + raise DomainError( + "Cannot compute rational simplification over %s" % domain) + + # compute only once + leading_monomials = [g.LM(opt.order) for g in polys[2:]] + tested = set() + + def staircase(n): + """ + Compute all monomials with degree less than ``n`` that are + not divisible by any element of ``leading_monomials``. + """ + if n == 0: + return [1] + S = [] + for mi in combinations_with_replacement(range(len(opt.gens)), n): + m = [0]*len(opt.gens) + for i in mi: + m[i] += 1 + if all(monomial_div(m, lmg) is None for lmg in + leading_monomials): + S.append(m) + + return [Monomial(s).as_expr(*opt.gens) for s in S] + staircase(n - 1) + + def _ratsimpmodprime(a, b, allsol, N=0, D=0): + r""" + Computes a rational simplification of ``a/b`` which minimizes + the sum of the total degrees of the numerator and the denominator. + + Explanation + =========== + + The algorithm proceeds by looking at ``a * d - b * c`` modulo + the ideal generated by ``G`` for some ``c`` and ``d`` with degree + less than ``a`` and ``b`` respectively. + The coefficients of ``c`` and ``d`` are indeterminates and thus + the coefficients of the normalform of ``a * d - b * c`` are + linear polynomials in these indeterminates. + If these linear polynomials, considered as system of + equations, have a nontrivial solution, then `\frac{a}{b} + \equiv \frac{c}{d}` modulo the ideal generated by ``G``. So, + by construction, the degree of ``c`` and ``d`` is less than + the degree of ``a`` and ``b``, so a simpler representation + has been found. + After a simpler representation has been found, the algorithm + tries to reduce the degree of the numerator and denominator + and returns the result afterwards. + + As an extension, if quick=False, we look at all possible degrees such + that the total degree is less than *or equal to* the best current + solution. We retain a list of all solutions of minimal degree, and try + to find the best one at the end. + """ + c, d = a, b + steps = 0 + + maxdeg = a.total_degree() + b.total_degree() + if quick: + bound = maxdeg - 1 + else: + bound = maxdeg + while N + D <= bound: + if (N, D) in tested: + break + tested.add((N, D)) + + M1 = staircase(N) + M2 = staircase(D) + debugf('%s / %s: %s, %s', (N, D, M1, M2)) + + Cs = symbols("c:%d" % len(M1), cls=Dummy) + Ds = symbols("d:%d" % len(M2), cls=Dummy) + ng = Cs + Ds + + c_hat = Poly( + sum(Cs[i] * M1[i] for i in range(len(M1))), opt.gens + ng) + d_hat = Poly( + sum(Ds[i] * M2[i] for i in range(len(M2))), opt.gens + ng) + + r = reduced(a * d_hat - b * c_hat, G, opt.gens + ng, + order=opt.order, polys=True)[1] + + S = Poly(r, gens=opt.gens).coeffs() + sol = solve(S, Cs + Ds, particular=True, quick=True) + + if sol and not all(s == 0 for s in sol.values()): + c = c_hat.subs(sol) + d = d_hat.subs(sol) + + # The "free" variables occurring before as parameters + # might still be in the substituted c, d, so set them + # to the value chosen before: + c = c.subs(dict(list(zip(Cs + Ds, [1] * (len(Cs) + len(Ds)))))) + d = d.subs(dict(list(zip(Cs + Ds, [1] * (len(Cs) + len(Ds)))))) + + c = Poly(c, opt.gens) + d = Poly(d, opt.gens) + if d == 0: + raise ValueError('Ideal not prime?') + + allsol.append((c_hat, d_hat, S, Cs + Ds)) + if N + D != maxdeg: + allsol = [allsol[-1]] + + break + + steps += 1 + N += 1 + D += 1 + + if steps > 0: + c, d, allsol = _ratsimpmodprime(c, d, allsol, N, D - steps) + c, d, allsol = _ratsimpmodprime(c, d, allsol, N - steps, D) + + return c, d, allsol + + # preprocessing. this improves performance a bit when deg(num) + # and deg(denom) are large: + num = reduced(num, G, opt.gens, order=opt.order)[1] + denom = reduced(denom, G, opt.gens, order=opt.order)[1] + + if polynomial: + return (num/denom).cancel() + + c, d, allsol = _ratsimpmodprime( + Poly(num, opt.gens, domain=opt.domain), Poly(denom, opt.gens, domain=opt.domain), []) + if not quick and allsol: + debugf('Looking for best minimal solution. Got: %s', len(allsol)) + newsol = [] + for c_hat, d_hat, S, ng in allsol: + sol = solve(S, ng, particular=True, quick=False) + # all values of sol should be numbers; if not, solve is broken + newsol.append((c_hat.subs(sol), d_hat.subs(sol))) + c, d = min(newsol, key=lambda x: len(x[0].terms()) + len(x[1].terms())) + + if not domain.is_Field: + cn, c = c.clear_denoms(convert=True) + dn, d = d.clear_denoms(convert=True) + r = Rational(cn, dn) + else: + r = Rational(1) + + return (c*r.q)/(d*r.p) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/simplify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/simplify.py new file mode 100644 index 0000000000000000000000000000000000000000..8b315cc20c19fc10c37b903d16129a7f5579ecd3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/simplify.py @@ -0,0 +1,2164 @@ +from __future__ import annotations + +from typing import overload + +from collections import defaultdict + +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core import (Basic, S, Add, Mul, Pow, Symbol, sympify, + expand_func, Function, Dummy, Expr, factor_terms, + expand_power_exp, Eq) +from sympy.core.exprtools import factor_nc +from sympy.core.parameters import global_parameters +from sympy.core.function import (expand_log, count_ops, _mexpand, + nfloat, expand_mul, expand) +from sympy.core.numbers import Float, I, pi, Rational, equal_valued +from sympy.core.relational import Relational +from sympy.core.rules import Transform +from sympy.core.sorting import ordered +from sympy.core.sympify import _sympify +from sympy.core.traversal import bottom_up as _bottom_up, walk as _walk +from sympy.functions import gamma, exp, sqrt, log, exp_polar, re +from sympy.functions.combinatorial.factorials import CombinatorialFunction +from sympy.functions.elementary.complexes import unpolarify, Abs, sign +from sympy.functions.elementary.exponential import ExpBase +from sympy.functions.elementary.hyperbolic import HyperbolicFunction +from sympy.functions.elementary.integers import ceiling +from sympy.functions.elementary.piecewise import (Piecewise, piecewise_fold, + piecewise_simplify) +from sympy.functions.elementary.trigonometric import TrigonometricFunction +from sympy.functions.special.bessel import (BesselBase, besselj, besseli, + besselk, bessely, jn) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import Boolean +from sympy.matrices.expressions import (MatrixExpr, MatAdd, MatMul, + MatPow, MatrixSymbol) +from sympy.polys import together, cancel, factor +from sympy.polys.numberfields.minpoly import _is_sum_surds, _minimal_polynomial_sq +from sympy.sets.sets import Set +from sympy.simplify.combsimp import combsimp +from sympy.simplify.cse_opts import sub_pre, sub_post +from sympy.simplify.hyperexpand import hyperexpand +from sympy.simplify.powsimp import powsimp +from sympy.simplify.radsimp import radsimp, fraction, collect_abs +from sympy.simplify.sqrtdenest import sqrtdenest +from sympy.simplify.trigsimp import trigsimp, exptrigsimp +from sympy.utilities.decorator import deprecated +from sympy.utilities.iterables import has_variety, sift, subsets, iterable +from sympy.utilities.misc import as_int + +import mpmath + + +def separatevars(expr, symbols=[], dict=False, force=False): + """ + Separates variables in an expression, if possible. By + default, it separates with respect to all symbols in an + expression and collects constant coefficients that are + independent of symbols. + + Explanation + =========== + + If ``dict=True`` then the separated terms will be returned + in a dictionary keyed to their corresponding symbols. + By default, all symbols in the expression will appear as + keys; if symbols are provided, then all those symbols will + be used as keys, and any terms in the expression containing + other symbols or non-symbols will be returned keyed to the + string 'coeff'. (Passing None for symbols will return the + expression in a dictionary keyed to 'coeff'.) + + If ``force=True``, then bases of powers will be separated regardless + of assumptions on the symbols involved. + + Notes + ===== + + The order of the factors is determined by Mul, so that the + separated expressions may not necessarily be grouped together. + + Although factoring is necessary to separate variables in some + expressions, it is not necessary in all cases, so one should not + count on the returned factors being factored. + + Examples + ======== + + >>> from sympy.abc import x, y, z, alpha + >>> from sympy import separatevars, sin + >>> separatevars((x*y)**y) + (x*y)**y + >>> separatevars((x*y)**y, force=True) + x**y*y**y + + >>> e = 2*x**2*z*sin(y)+2*z*x**2 + >>> separatevars(e) + 2*x**2*z*(sin(y) + 1) + >>> separatevars(e, symbols=(x, y), dict=True) + {'coeff': 2*z, x: x**2, y: sin(y) + 1} + >>> separatevars(e, [x, y, alpha], dict=True) + {'coeff': 2*z, alpha: 1, x: x**2, y: sin(y) + 1} + + If the expression is not really separable, or is only partially + separable, separatevars will do the best it can to separate it + by using factoring. + + >>> separatevars(x + x*y - 3*x**2) + -x*(3*x - y - 1) + + If the expression is not separable then expr is returned unchanged + or (if dict=True) then None is returned. + + >>> eq = 2*x + y*sin(x) + >>> separatevars(eq) == eq + True + >>> separatevars(2*x + y*sin(x), symbols=(x, y), dict=True) is None + True + + """ + expr = sympify(expr) + if dict: + return _separatevars_dict(_separatevars(expr, force), symbols) + else: + return _separatevars(expr, force) + + +def _separatevars(expr, force): + if isinstance(expr, Abs): + arg = expr.args[0] + if arg.is_Mul and not arg.is_number: + s = separatevars(arg, dict=True, force=force) + if s is not None: + return Mul(*map(expr.func, s.values())) + else: + return expr + + if len(expr.free_symbols) < 2: + return expr + + # don't destroy a Mul since much of the work may already be done + if expr.is_Mul: + args = list(expr.args) + changed = False + for i, a in enumerate(args): + args[i] = separatevars(a, force) + changed = changed or args[i] != a + if changed: + expr = expr.func(*args) + return expr + + # get a Pow ready for expansion + if expr.is_Pow and expr.base != S.Exp1: + expr = Pow(separatevars(expr.base, force=force), expr.exp) + + # First try other expansion methods + expr = expr.expand(mul=False, multinomial=False, force=force) + + _expr, reps = posify(expr) if force else (expr, {}) + expr = factor(_expr).subs(reps) + + if not expr.is_Add: + return expr + + # Find any common coefficients to pull out + args = list(expr.args) + commonc = args[0].args_cnc(cset=True, warn=False)[0] + for i in args[1:]: + commonc &= i.args_cnc(cset=True, warn=False)[0] + commonc = Mul(*commonc) + commonc = commonc.as_coeff_Mul()[1] # ignore constants + commonc_set = commonc.args_cnc(cset=True, warn=False)[0] + + # remove them + for i, a in enumerate(args): + c, nc = a.args_cnc(cset=True, warn=False) + c = c - commonc_set + args[i] = Mul(*c)*Mul(*nc) + nonsepar = Add(*args) + + if len(nonsepar.free_symbols) > 1: + _expr = nonsepar + _expr, reps = posify(_expr) if force else (_expr, {}) + _expr = (factor(_expr)).subs(reps) + + if not _expr.is_Add: + nonsepar = _expr + + return commonc*nonsepar + + +def _separatevars_dict(expr, symbols): + if symbols: + if not all(t.is_Atom for t in symbols): + raise ValueError("symbols must be Atoms.") + symbols = list(symbols) + elif symbols is None: + return {'coeff': expr} + else: + symbols = list(expr.free_symbols) + if not symbols: + return None + + ret = {i: [] for i in symbols + ['coeff']} + + for i in Mul.make_args(expr): + expsym = i.free_symbols + intersection = set(symbols).intersection(expsym) + if len(intersection) > 1: + return None + if len(intersection) == 0: + # There are no symbols, so it is part of the coefficient + ret['coeff'].append(i) + else: + ret[intersection.pop()].append(i) + + # rebuild + for k, v in ret.items(): + ret[k] = Mul(*v) + + return ret + + +def posify(eq): + """Return ``eq`` (with generic symbols made positive) and a + dictionary containing the mapping between the old and new + symbols. + + Explanation + =========== + + Any symbol that has positive=None will be replaced with a positive dummy + symbol having the same name. This replacement will allow more symbolic + processing of expressions, especially those involving powers and + logarithms. + + A dictionary that can be sent to subs to restore ``eq`` to its original + symbols is also returned. + + >>> from sympy import posify, Symbol, log, solve + >>> from sympy.abc import x + >>> posify(x + Symbol('p', positive=True) + Symbol('n', negative=True)) + (_x + n + p, {_x: x}) + + >>> eq = 1/x + >>> log(eq).expand() + log(1/x) + >>> log(posify(eq)[0]).expand() + -log(_x) + >>> p, rep = posify(eq) + >>> log(p).expand().subs(rep) + -log(x) + + It is possible to apply the same transformations to an iterable + of expressions: + + >>> eq = x**2 - 4 + >>> solve(eq, x) + [-2, 2] + >>> eq_x, reps = posify([eq, x]); eq_x + [_x**2 - 4, _x] + >>> solve(*eq_x) + [2] + """ + eq = sympify(eq) + if not isinstance(eq, Basic) and iterable(eq): + f = type(eq) + eq = list(eq) + syms = set() + for e in eq: + syms = syms.union(e.atoms(Symbol)) + reps = {} + for s in syms: + reps.update({v: k for k, v in posify(s)[1].items()}) + for i, e in enumerate(eq): + eq[i] = e.subs(reps) + return f(eq), {r: s for s, r in reps.items()} + + reps = {s: Dummy(s.name, positive=True, **s.assumptions0) + for s in eq.free_symbols if s.is_positive is None} + eq = eq.subs(reps) + return eq, {r: s for s, r in reps.items()} + + +def hypersimp(f, k): + """Given combinatorial term f(k) simplify its consecutive term ratio + i.e. f(k+1)/f(k). The input term can be composed of functions and + integer sequences which have equivalent representation in terms + of gamma special function. + + Explanation + =========== + + The algorithm performs three basic steps: + + 1. Rewrite all functions in terms of gamma, if possible. + + 2. Rewrite all occurrences of gamma in terms of products + of gamma and rising factorial with integer, absolute + constant exponent. + + 3. Perform simplification of nested fractions, powers + and if the resulting expression is a quotient of + polynomials, reduce their total degree. + + If f(k) is hypergeometric then as result we arrive with a + quotient of polynomials of minimal degree. Otherwise None + is returned. + + For more information on the implemented algorithm refer to: + + 1. W. Koepf, Algorithms for m-fold Hypergeometric Summation, + Journal of Symbolic Computation (1995) 20, 399-417 + """ + f = sympify(f) + + g = f.subs(k, k + 1) / f + + g = g.rewrite(gamma) + if g.has(Piecewise): + g = piecewise_fold(g) + g = g.args[-1][0] + g = expand_func(g) + g = powsimp(g, deep=True, combine='exp') + + if g.is_rational_function(k): + return simplify(g, ratio=S.Infinity) + else: + return None + + +def hypersimilar(f, g, k): + """ + Returns True if ``f`` and ``g`` are hyper-similar. + + Explanation + =========== + + Similarity in hypergeometric sense means that a quotient of + f(k) and g(k) is a rational function in ``k``. This procedure + is useful in solving recurrence relations. + + For more information see hypersimp(). + + """ + f, g = list(map(sympify, (f, g))) + + h = (f/g).rewrite(gamma) + h = h.expand(func=True, basic=False) + + return h.is_rational_function(k) + + +def signsimp(expr, evaluate=None): + """Make all Add sub-expressions canonical wrt sign. + + Explanation + =========== + + If an Add subexpression, ``a``, can have a sign extracted, + as determined by could_extract_minus_sign, it is replaced + with Mul(-1, a, evaluate=False). This allows signs to be + extracted from powers and products. + + Examples + ======== + + >>> from sympy import signsimp, exp, symbols + >>> from sympy.abc import x, y + >>> i = symbols('i', odd=True) + >>> n = -1 + 1/x + >>> n/x/(-n)**2 - 1/n/x + (-1 + 1/x)/(x*(1 - 1/x)**2) - 1/(x*(-1 + 1/x)) + >>> signsimp(_) + 0 + >>> x*n + x*-n + x*(-1 + 1/x) + x*(1 - 1/x) + >>> signsimp(_) + 0 + + Since powers automatically handle leading signs + + >>> (-2)**i + -2**i + + signsimp can be used to put the base of a power with an integer + exponent into canonical form: + + >>> n**i + (-1 + 1/x)**i + + By default, signsimp does not leave behind any hollow simplification: + if making an Add canonical wrt sign didn't change the expression, the + original Add is restored. If this is not desired then the keyword + ``evaluate`` can be set to False: + + >>> e = exp(y - x) + >>> signsimp(e) == e + True + >>> signsimp(e, evaluate=False) + exp(-(x - y)) + + """ + if evaluate is None: + evaluate = global_parameters.evaluate + expr = sympify(expr) + if not isinstance(expr, (Expr, Relational)) or expr.is_Atom: + return expr + # get rid of an pre-existing unevaluation regarding sign + e = expr.replace(lambda x: x.is_Mul and -(-x) != x, lambda x: -(-x)) + e = sub_post(sub_pre(e)) + if not isinstance(e, (Expr, Relational)) or e.is_Atom: + return e + if e.is_Add: + rv = e.func(*[signsimp(a) for a in e.args]) + if not evaluate and isinstance(rv, Add + ) and rv.could_extract_minus_sign(): + return Mul(S.NegativeOne, -rv, evaluate=False) + return rv + if evaluate: + e = e.replace(lambda x: x.is_Mul and -(-x) != x, lambda x: -(-x)) + return e + + +@overload +def simplify(expr: Expr, **kwargs) -> Expr: ... +@overload +def simplify(expr: Boolean, **kwargs) -> Boolean: ... +@overload +def simplify(expr: Set, **kwargs) -> Set: ... +@overload +def simplify(expr: Basic, **kwargs) -> Basic: ... + +def simplify(expr, ratio=1.7, measure=count_ops, rational=False, inverse=False, doit=True, **kwargs): + """Simplifies the given expression. + + Explanation + =========== + + Simplification is not a well defined term and the exact strategies + this function tries can change in the future versions of SymPy. If + your algorithm relies on "simplification" (whatever it is), try to + determine what you need exactly - is it powsimp()?, radsimp()?, + together()?, logcombine()?, or something else? And use this particular + function directly, because those are well defined and thus your algorithm + will be robust. + + Nonetheless, especially for interactive use, or when you do not know + anything about the structure of the expression, simplify() tries to apply + intelligent heuristics to make the input expression "simpler". For + example: + + >>> from sympy import simplify, cos, sin + >>> from sympy.abc import x, y + >>> a = (x + x**2)/(x*sin(y)**2 + x*cos(y)**2) + >>> a + (x**2 + x)/(x*sin(y)**2 + x*cos(y)**2) + >>> simplify(a) + x + 1 + + Note that we could have obtained the same result by using specific + simplification functions: + + >>> from sympy import trigsimp, cancel + >>> trigsimp(a) + (x**2 + x)/x + >>> cancel(_) + x + 1 + + In some cases, applying :func:`simplify` may actually result in some more + complicated expression. The default ``ratio=1.7`` prevents more extreme + cases: if (result length)/(input length) > ratio, then input is returned + unmodified. The ``measure`` parameter lets you specify the function used + to determine how complex an expression is. The function should take a + single argument as an expression and return a number such that if + expression ``a`` is more complex than expression ``b``, then + ``measure(a) > measure(b)``. The default measure function is + :func:`~.count_ops`, which returns the total number of operations in the + expression. + + For example, if ``ratio=1``, ``simplify`` output cannot be longer + than input. + + :: + + >>> from sympy import sqrt, simplify, count_ops, oo + >>> root = 1/(sqrt(2)+3) + + Since ``simplify(root)`` would result in a slightly longer expression, + root is returned unchanged instead:: + + >>> simplify(root, ratio=1) == root + True + + If ``ratio=oo``, simplify will be applied anyway:: + + >>> count_ops(simplify(root, ratio=oo)) > count_ops(root) + True + + Note that the shortest expression is not necessary the simplest, so + setting ``ratio`` to 1 may not be a good idea. + Heuristically, the default value ``ratio=1.7`` seems like a reasonable + choice. + + You can easily define your own measure function based on what you feel + should represent the "size" or "complexity" of the input expression. Note + that some choices, such as ``lambda expr: len(str(expr))`` may appear to be + good metrics, but have other problems (in this case, the measure function + may slow down simplify too much for very large expressions). If you do not + know what a good metric would be, the default, ``count_ops``, is a good + one. + + For example: + + >>> from sympy import symbols, log + >>> a, b = symbols('a b', positive=True) + >>> g = log(a) + log(b) + log(a)*log(1/b) + >>> h = simplify(g) + >>> h + log(a*b**(1 - log(a))) + >>> count_ops(g) + 8 + >>> count_ops(h) + 5 + + So you can see that ``h`` is simpler than ``g`` using the count_ops metric. + However, we may not like how ``simplify`` (in this case, using + ``logcombine``) has created the ``b**(log(1/a) + 1)`` term. A simple way + to reduce this would be to give more weight to powers as operations in + ``count_ops``. We can do this by using the ``visual=True`` option: + + >>> print(count_ops(g, visual=True)) + 2*ADD + DIV + 4*LOG + MUL + >>> print(count_ops(h, visual=True)) + 2*LOG + MUL + POW + SUB + + >>> from sympy import Symbol, S + >>> def my_measure(expr): + ... POW = Symbol('POW') + ... # Discourage powers by giving POW a weight of 10 + ... count = count_ops(expr, visual=True).subs(POW, 10) + ... # Every other operation gets a weight of 1 (the default) + ... count = count.replace(Symbol, type(S.One)) + ... return count + >>> my_measure(g) + 8 + >>> my_measure(h) + 14 + >>> 15./8 > 1.7 # 1.7 is the default ratio + True + >>> simplify(g, measure=my_measure) + -log(a)*log(b) + log(a) + log(b) + + Note that because ``simplify()`` internally tries many different + simplification strategies and then compares them using the measure + function, we get a completely different result that is still different + from the input expression by doing this. + + If ``rational=True``, Floats will be recast as Rationals before simplification. + If ``rational=None``, Floats will be recast as Rationals but the result will + be recast as Floats. If rational=False(default) then nothing will be done + to the Floats. + + If ``inverse=True``, it will be assumed that a composition of inverse + functions, such as sin and asin, can be cancelled in any order. + For example, ``asin(sin(x))`` will yield ``x`` without checking whether + x belongs to the set where this relation is true. The default is + False. + + Note that ``simplify()`` automatically calls ``doit()`` on the final + expression. You can avoid this behavior by passing ``doit=False`` as + an argument. + + Also, it should be noted that simplifying a boolean expression is not + well defined. If the expression prefers automatic evaluation (such as + :obj:`~.Eq()` or :obj:`~.Or()`), simplification will return ``True`` or + ``False`` if truth value can be determined. If the expression is not + evaluated by default (such as :obj:`~.Predicate()`), simplification will + not reduce it and you should use :func:`~.refine` or :func:`~.ask` + function. This inconsistency will be resolved in future version. + + See Also + ======== + + sympy.assumptions.refine.refine : Simplification using assumptions. + sympy.assumptions.ask.ask : Query for boolean expressions using assumptions. + """ + + def shorter(*choices): + """ + Return the choice that has the fewest ops. In case of a tie, + the expression listed first is selected. + """ + if not has_variety(choices): + return choices[0] + return min(choices, key=measure) + + def done(e): + rv = e.doit() if doit else e + return shorter(rv, collect_abs(rv)) + + expr = sympify(expr, rational=rational) + kwargs = { + "ratio": kwargs.get('ratio', ratio), + "measure": kwargs.get('measure', measure), + "rational": kwargs.get('rational', rational), + "inverse": kwargs.get('inverse', inverse), + "doit": kwargs.get('doit', doit)} + # no routine for Expr needs to check for is_zero + if isinstance(expr, Expr) and expr.is_zero: + return S.Zero if not expr.is_Number else expr + + _eval_simplify = getattr(expr, '_eval_simplify', None) + if _eval_simplify is not None: + return _eval_simplify(**kwargs) + + original_expr = expr = collect_abs(signsimp(expr)) + + if not isinstance(expr, Basic) or not expr.args: # XXX: temporary hack + return expr + + if inverse and expr.has(Function): + expr = inversecombine(expr) + if not expr.args: # simplified to atomic + return expr + + # do deep simplification + handled = Add, Mul, Pow, ExpBase + expr = expr.replace( + # here, checking for x.args is not enough because Basic has + # args but Basic does not always play well with replace, e.g. + # when simultaneous is True found expressions will be masked + # off with a Dummy but not all Basic objects in an expression + # can be replaced with a Dummy + lambda x: isinstance(x, Expr) and x.args and not isinstance( + x, handled), + lambda x: x.func(*[simplify(i, **kwargs) for i in x.args]), + simultaneous=False) + if not isinstance(expr, handled): + return done(expr) + + if not expr.is_commutative: + expr = nc_simplify(expr) + + # TODO: Apply different strategies, considering expression pattern: + # is it a purely rational function? Is there any trigonometric function?... + # See also https://github.com/sympy/sympy/pull/185. + + # rationalize Floats + floats = False + if rational is not False and expr.has(Float): + floats = True + expr = nsimplify(expr, rational=True) + + expr = _bottom_up(expr, lambda w: getattr(w, 'normal', lambda: w)()) + expr = Mul(*powsimp(expr).as_content_primitive()) + _e = cancel(expr) + expr1 = shorter(_e, _mexpand(_e).cancel()) # issue 6829 + expr2 = shorter(together(expr, deep=True), together(expr1, deep=True)) + + if ratio is S.Infinity: + expr = expr2 + else: + expr = shorter(expr2, expr1, expr) + if not isinstance(expr, Basic): # XXX: temporary hack + return expr + + expr = factor_terms(expr, sign=False) + + # must come before `Piecewise` since this introduces more `Piecewise` terms + if expr.has(sign): + expr = expr.rewrite(Abs) + + # Deal with Piecewise separately to avoid recursive growth of expressions + if expr.has(Piecewise): + # Fold into a single Piecewise + expr = piecewise_fold(expr) + # Apply doit, if doit=True + expr = done(expr) + # Still a Piecewise? + if expr.has(Piecewise): + # Fold into a single Piecewise, in case doit lead to some + # expressions being Piecewise + expr = piecewise_fold(expr) + # kroneckersimp also affects Piecewise + if expr.has(KroneckerDelta): + expr = kroneckersimp(expr) + # Still a Piecewise? + if expr.has(Piecewise): + # Do not apply doit on the segments as it has already + # been done above, but simplify + expr = piecewise_simplify(expr, deep=True, doit=False) + # Still a Piecewise? + if expr.has(Piecewise): + # Try factor common terms + expr = shorter(expr, factor_terms(expr)) + # As all expressions have been simplified above with the + # complete simplify, nothing more needs to be done here + return expr + + # hyperexpand automatically only works on hypergeometric terms + # Do this after the Piecewise part to avoid recursive expansion + expr = hyperexpand(expr) + + if expr.has(KroneckerDelta): + expr = kroneckersimp(expr) + + if expr.has(BesselBase): + expr = besselsimp(expr) + + if expr.has(TrigonometricFunction, HyperbolicFunction): + expr = trigsimp(expr, deep=True) + + if expr.has(log): + expr = shorter(expand_log(expr, deep=True), logcombine(expr)) + + if expr.has(CombinatorialFunction, gamma): + # expression with gamma functions or non-integer arguments is + # automatically passed to gammasimp + expr = combsimp(expr) + + if expr.has(Sum): + expr = sum_simplify(expr, **kwargs) + + if expr.has(Integral): + expr = expr.xreplace({ + i: factor_terms(i) for i in expr.atoms(Integral)}) + + if expr.has(Product): + expr = product_simplify(expr, **kwargs) + + from sympy.physics.units import Quantity + + if expr.has(Quantity): + from sympy.physics.units.util import quantity_simplify + expr = quantity_simplify(expr) + + short = shorter(powsimp(expr, combine='exp', deep=True), powsimp(expr), expr) + short = shorter(short, cancel(short)) + short = shorter(short, factor_terms(short), expand_power_exp(expand_mul(short))) + if short.has(TrigonometricFunction, HyperbolicFunction, ExpBase, exp): + short = exptrigsimp(short) + + # get rid of hollow 2-arg Mul factorization + hollow_mul = Transform( + lambda x: Mul(*x.args), + lambda x: + x.is_Mul and + len(x.args) == 2 and + x.args[0].is_Number and + x.args[1].is_Add and + x.is_commutative) + expr = short.xreplace(hollow_mul) + + numer, denom = expr.as_numer_denom() + if denom.is_Add: + n, d = fraction(radsimp(1/denom, symbolic=False, max_terms=1)) + if n is not S.One: + expr = (numer*n).expand()/d + + if expr.could_extract_minus_sign(): + n, d = fraction(expr) + if d != 0: + expr = signsimp(-n/(-d)) + + if measure(expr) > ratio*measure(original_expr): + expr = original_expr + + # restore floats + if floats and rational is None: + expr = nfloat(expr, exponent=False) + + return done(expr) + + +def sum_simplify(s, **kwargs): + """Main function for Sum simplification""" + if not isinstance(s, Add): + s = s.xreplace({a: sum_simplify(a, **kwargs) + for a in s.atoms(Add) if a.has(Sum)}) + s = expand(s) + if not isinstance(s, Add): + return s + + terms = s.args + s_t = [] # Sum Terms + o_t = [] # Other Terms + + for term in terms: + sum_terms, other = sift(Mul.make_args(term), + lambda i: isinstance(i, Sum), binary=True) + if not sum_terms: + o_t.append(term) + continue + other = [Mul(*other)] + s_t.append(Mul(*(other + [s._eval_simplify(**kwargs) for s in sum_terms]))) + + result = Add(sum_combine(s_t), *o_t) + + return result + + +def sum_combine(s_t): + """Helper function for Sum simplification + + Attempts to simplify a list of sums, by combining limits / sum function's + returns the simplified sum + """ + used = [False] * len(s_t) + + for method in range(2): + for i, s_term1 in enumerate(s_t): + if not used[i]: + for j, s_term2 in enumerate(s_t): + if not used[j] and i != j: + temp = sum_add(s_term1, s_term2, method) + if isinstance(temp, (Sum, Mul)): + s_t[i] = temp + s_term1 = s_t[i] + used[j] = True + + result = S.Zero + for i, s_term in enumerate(s_t): + if not used[i]: + result = Add(result, s_term) + + return result + +def factor_sum(self, limits=None, radical=False, clear=False, fraction=False, sign=True): + """Return Sum with constant factors extracted. + + If ``limits`` is specified then ``self`` is the summand; the other + keywords are passed to ``factor_terms``. + + Examples + ======== + + >>> from sympy import Sum + >>> from sympy.abc import x, y + >>> from sympy.simplify.simplify import factor_sum + >>> s = Sum(x*y, (x, 1, 3)) + >>> factor_sum(s) + y*Sum(x, (x, 1, 3)) + >>> factor_sum(s.function, s.limits) + y*Sum(x, (x, 1, 3)) + """ + + # XXX deprecate in favor of direct call to factor_terms + kwargs = {"radical": radical, "clear": clear, + "fraction": fraction, "sign": sign} + expr = Sum(self, *limits) if limits else self + return factor_terms(expr, **kwargs) + + +def sum_add(self, other, method=0): + """Helper function for Sum simplification""" + #we know this is something in terms of a constant * a sum + #so we temporarily put the constants inside for simplification + #then simplify the result + def __refactor(val): + args = Mul.make_args(val) + sumv = next(x for x in args if isinstance(x, Sum)) + constant = Mul(*[x for x in args if x != sumv]) + return Sum(constant * sumv.function, *sumv.limits) + + if isinstance(self, Mul): + rself = __refactor(self) + else: + rself = self + + if isinstance(other, Mul): + rother = __refactor(other) + else: + rother = other + + if type(rself) is type(rother): + if method == 0: + if rself.limits == rother.limits: + return factor_sum(Sum(rself.function + rother.function, *rself.limits)) + elif method == 1: + if simplify(rself.function - rother.function) == 0: + if len(rself.limits) == len(rother.limits) == 1: + i = rself.limits[0][0] + x1 = rself.limits[0][1] + y1 = rself.limits[0][2] + j = rother.limits[0][0] + x2 = rother.limits[0][1] + y2 = rother.limits[0][2] + + if i == j: + if x2 == y1 + 1: + return factor_sum(Sum(rself.function, (i, x1, y2))) + elif x1 == y2 + 1: + return factor_sum(Sum(rself.function, (i, x2, y1))) + + return Add(self, other) + + +def product_simplify(s, **kwargs): + """Main function for Product simplification""" + terms = Mul.make_args(s) + p_t = [] # Product Terms + o_t = [] # Other Terms + + deep = kwargs.get('deep', True) + for term in terms: + if isinstance(term, Product): + if deep: + p_t.append(Product(term.function.simplify(**kwargs), + *term.limits)) + else: + p_t.append(term) + else: + o_t.append(term) + + used = [False] * len(p_t) + + for method in range(2): + for i, p_term1 in enumerate(p_t): + if not used[i]: + for j, p_term2 in enumerate(p_t): + if not used[j] and i != j: + tmp_prod = product_mul(p_term1, p_term2, method) + if isinstance(tmp_prod, Product): + p_t[i] = tmp_prod + used[j] = True + + result = Mul(*o_t) + + for i, p_term in enumerate(p_t): + if not used[i]: + result = Mul(result, p_term) + + return result + + +def product_mul(self, other, method=0): + """Helper function for Product simplification""" + if type(self) is type(other): + if method == 0: + if self.limits == other.limits: + return Product(self.function * other.function, *self.limits) + elif method == 1: + if simplify(self.function - other.function) == 0: + if len(self.limits) == len(other.limits) == 1: + i = self.limits[0][0] + x1 = self.limits[0][1] + y1 = self.limits[0][2] + j = other.limits[0][0] + x2 = other.limits[0][1] + y2 = other.limits[0][2] + + if i == j: + if x2 == y1 + 1: + return Product(self.function, (i, x1, y2)) + elif x1 == y2 + 1: + return Product(self.function, (i, x2, y1)) + + return Mul(self, other) + + +def _nthroot_solve(p, n, prec): + """ + helper function for ``nthroot`` + It denests ``p**Rational(1, n)`` using its minimal polynomial + """ + from sympy.solvers import solve + while n % 2 == 0: + p = sqrtdenest(sqrt(p)) + n = n // 2 + if n == 1: + return p + pn = p**Rational(1, n) + x = Symbol('x') + f = _minimal_polynomial_sq(p, n, x) + if f is None: + return None + sols = solve(f, x) + for sol in sols: + if abs(sol - pn).n() < 1./10**prec: + sol = sqrtdenest(sol) + if _mexpand(sol**n) == p: + return sol + + +def logcombine(expr, force=False): + """ + Takes logarithms and combines them using the following rules: + + - log(x) + log(y) == log(x*y) if both are positive + - a*log(x) == log(x**a) if x is positive and a is real + + If ``force`` is ``True`` then the assumptions above will be assumed to hold if + there is no assumption already in place on a quantity. For example, if + ``a`` is imaginary or the argument negative, force will not perform a + combination but if ``a`` is a symbol with no assumptions the change will + take place. + + Examples + ======== + + >>> from sympy import Symbol, symbols, log, logcombine, I + >>> from sympy.abc import a, x, y, z + >>> logcombine(a*log(x) + log(y) - log(z)) + a*log(x) + log(y) - log(z) + >>> logcombine(a*log(x) + log(y) - log(z), force=True) + log(x**a*y/z) + >>> x,y,z = symbols('x,y,z', positive=True) + >>> a = Symbol('a', real=True) + >>> logcombine(a*log(x) + log(y) - log(z)) + log(x**a*y/z) + + The transformation is limited to factors and/or terms that + contain logs, so the result depends on the initial state of + expansion: + + >>> eq = (2 + 3*I)*log(x) + >>> logcombine(eq, force=True) == eq + True + >>> logcombine(eq.expand(), force=True) + log(x**2) + I*log(x**3) + + See Also + ======== + + posify: replace all symbols with symbols having positive assumptions + sympy.core.function.expand_log: expand the logarithms of products + and powers; the opposite of logcombine + + """ + + def f(rv): + if not (rv.is_Add or rv.is_Mul): + return rv + + def gooda(a): + # bool to tell whether the leading ``a`` in ``a*log(x)`` + # could appear as log(x**a) + return (a is not S.NegativeOne and # -1 *could* go, but we disallow + (a.is_extended_real or force and a.is_extended_real is not False)) + + def goodlog(l): + # bool to tell whether log ``l``'s argument can combine with others + a = l.args[0] + return a.is_positive or force and a.is_nonpositive is not False + + other = [] + logs = [] + log1 = defaultdict(list) + for a in Add.make_args(rv): + if isinstance(a, log) and goodlog(a): + log1[()].append(([], a)) + elif not a.is_Mul: + other.append(a) + else: + ot = [] + co = [] + lo = [] + for ai in a.args: + if ai.is_Rational and ai < 0: + ot.append(S.NegativeOne) + co.append(-ai) + elif isinstance(ai, log) and goodlog(ai): + lo.append(ai) + elif gooda(ai): + co.append(ai) + else: + ot.append(ai) + if len(lo) > 1: + logs.append((ot, co, lo)) + elif lo: + log1[tuple(ot)].append((co, lo[0])) + else: + other.append(a) + + # if there is only one log in other, put it with the + # good logs + if len(other) == 1 and isinstance(other[0], log): + log1[()].append(([], other.pop())) + # if there is only one log at each coefficient and none have + # an exponent to place inside the log then there is nothing to do + if not logs and all(len(log1[k]) == 1 and log1[k][0] == [] for k in log1): + return rv + + # collapse multi-logs as far as possible in a canonical way + # TODO: see if x*log(a)+x*log(a)*log(b) -> x*log(a)*(1+log(b))? + # -- in this case, it's unambiguous, but if it were were a log(c) in + # each term then it's arbitrary whether they are grouped by log(a) or + # by log(c). So for now, just leave this alone; it's probably better to + # let the user decide + for o, e, l in logs: + l = list(ordered(l)) + e = log(l.pop(0).args[0]**Mul(*e)) + while l: + li = l.pop(0) + e = log(li.args[0]**e) + c, l = Mul(*o), e + if isinstance(l, log): # it should be, but check to be sure + log1[(c,)].append(([], l)) + else: + other.append(c*l) + + # logs that have the same coefficient can multiply + for k in list(log1.keys()): + log1[Mul(*k)] = log(logcombine(Mul(*[ + l.args[0]**Mul(*c) for c, l in log1.pop(k)]), + force=force), evaluate=False) + + # logs that have oppositely signed coefficients can divide + for k in ordered(list(log1.keys())): + if k not in log1: # already popped as -k + continue + if -k in log1: + # figure out which has the minus sign; the one with + # more op counts should be the one + num, den = k, -k + if num.count_ops() > den.count_ops(): + num, den = den, num + other.append( + num*log(log1.pop(num).args[0]/log1.pop(den).args[0], + evaluate=False)) + else: + other.append(k*log1.pop(k)) + + return Add(*other) + + return _bottom_up(expr, f) + + +def inversecombine(expr): + """Simplify the composition of a function and its inverse. + + Explanation + =========== + + No attention is paid to whether the inverse is a left inverse or a + right inverse; thus, the result will in general not be equivalent + to the original expression. + + Examples + ======== + + >>> from sympy.simplify.simplify import inversecombine + >>> from sympy import asin, sin, log, exp + >>> from sympy.abc import x + >>> inversecombine(asin(sin(x))) + x + >>> inversecombine(2*log(exp(3*x))) + 6*x + """ + + def f(rv): + if isinstance(rv, log): + if isinstance(rv.args[0], exp) or (rv.args[0].is_Pow and rv.args[0].base == S.Exp1): + rv = rv.args[0].exp + elif rv.is_Function and hasattr(rv, "inverse"): + if (len(rv.args) == 1 and len(rv.args[0].args) == 1 and + isinstance(rv.args[0], rv.inverse(argindex=1))): + rv = rv.args[0].args[0] + if rv.is_Pow and rv.base == S.Exp1: + if isinstance(rv.exp, log): + rv = rv.exp.args[0] + return rv + + return _bottom_up(expr, f) + + +def kroneckersimp(expr): + """ + Simplify expressions with KroneckerDelta. + + The only simplification currently attempted is to identify multiplicative cancellation: + + Examples + ======== + + >>> from sympy import KroneckerDelta, kroneckersimp + >>> from sympy.abc import i + >>> kroneckersimp(1 + KroneckerDelta(0, i) * KroneckerDelta(1, i)) + 1 + """ + def args_cancel(args1, args2): + for i1 in range(2): + for i2 in range(2): + a1 = args1[i1] + a2 = args2[i2] + a3 = args1[(i1 + 1) % 2] + a4 = args2[(i2 + 1) % 2] + if Eq(a1, a2) is S.true and Eq(a3, a4) is S.false: + return True + return False + + def cancel_kronecker_mul(m): + args = m.args + deltas = [a for a in args if isinstance(a, KroneckerDelta)] + for delta1, delta2 in subsets(deltas, 2): + args1 = delta1.args + args2 = delta2.args + if args_cancel(args1, args2): + return S.Zero * m # In case of oo etc + return m + + if not expr.has(KroneckerDelta): + return expr + + if expr.has(Piecewise): + expr = expr.rewrite(KroneckerDelta) + + newexpr = expr + expr = None + + while newexpr != expr: + expr = newexpr + newexpr = expr.replace(lambda e: isinstance(e, Mul), cancel_kronecker_mul) + + return expr + + +def besselsimp(expr): + """ + Simplify bessel-type functions. + + Explanation + =========== + + This routine tries to simplify bessel-type functions. Currently it only + works on the Bessel J and I functions, however. It works by looking at all + such functions in turn, and eliminating factors of "I" and "-1" (actually + their polar equivalents) in front of the argument. Then, functions of + half-integer order are rewritten using trigonometric functions and + functions of integer order (> 1) are rewritten using functions + of low order. Finally, if the expression was changed, compute + factorization of the result with factor(). + + >>> from sympy import besselj, besseli, besselsimp, polar_lift, I, S + >>> from sympy.abc import z, nu + >>> besselsimp(besselj(nu, z*polar_lift(-1))) + exp(I*pi*nu)*besselj(nu, z) + >>> besselsimp(besseli(nu, z*polar_lift(-I))) + exp(-I*pi*nu/2)*besselj(nu, z) + >>> besselsimp(besseli(S(-1)/2, z)) + sqrt(2)*cosh(z)/(sqrt(pi)*sqrt(z)) + >>> besselsimp(z*besseli(0, z) + z*(besseli(2, z))/2 + besseli(1, z)) + 3*z*besseli(0, z)/2 + """ + # TODO + # - better algorithm? + # - simplify (cos(pi*b)*besselj(b,z) - besselj(-b,z))/sin(pi*b) ... + # - use contiguity relations? + + def replacer(fro, to, factors): + factors = set(factors) + + def repl(nu, z): + if factors.intersection(Mul.make_args(z)): + return to(nu, z) + return fro(nu, z) + return repl + + def torewrite(fro, to): + def tofunc(nu, z): + return fro(nu, z).rewrite(to) + return tofunc + + def tominus(fro): + def tofunc(nu, z): + return exp(I*pi*nu)*fro(nu, exp_polar(-I*pi)*z) + return tofunc + + orig_expr = expr + + ifactors = [I, exp_polar(I*pi/2), exp_polar(-I*pi/2)] + expr = expr.replace( + besselj, replacer(besselj, + torewrite(besselj, besseli), ifactors)) + expr = expr.replace( + besseli, replacer(besseli, + torewrite(besseli, besselj), ifactors)) + + minusfactors = [-1, exp_polar(I*pi)] + expr = expr.replace( + besselj, replacer(besselj, tominus(besselj), minusfactors)) + expr = expr.replace( + besseli, replacer(besseli, tominus(besseli), minusfactors)) + + z0 = Dummy('z') + + def expander(fro): + def repl(nu, z): + if (nu % 1) == S.Half: + return simplify(trigsimp(unpolarify( + fro(nu, z0).rewrite(besselj).rewrite(jn).expand( + func=True)).subs(z0, z))) + elif nu.is_Integer and nu > 1: + return fro(nu, z).expand(func=True) + return fro(nu, z) + return repl + + expr = expr.replace(besselj, expander(besselj)) + expr = expr.replace(bessely, expander(bessely)) + expr = expr.replace(besseli, expander(besseli)) + expr = expr.replace(besselk, expander(besselk)) + + def _bessel_simp_recursion(expr): + + def _use_recursion(bessel, expr): + while True: + bessels = expr.find(lambda x: isinstance(x, bessel)) + try: + for ba in sorted(bessels, key=lambda x: re(x.args[0])): + a, x = ba.args + bap1 = bessel(a+1, x) + bap2 = bessel(a+2, x) + if expr.has(bap1) and expr.has(bap2): + expr = expr.subs(ba, 2*(a+1)/x*bap1 - bap2) + break + else: + return expr + except (ValueError, TypeError): + return expr + if expr.has(besselj): + expr = _use_recursion(besselj, expr) + if expr.has(bessely): + expr = _use_recursion(bessely, expr) + return expr + + expr = _bessel_simp_recursion(expr) + if expr != orig_expr: + expr = expr.factor() + + return expr + + +def nthroot(expr, n, max_len=4, prec=15): + """ + Compute a real nth-root of a sum of surds. + + Parameters + ========== + + expr : sum of surds + n : integer + max_len : maximum number of surds passed as constants to ``nsimplify`` + + Algorithm + ========= + + First ``nsimplify`` is used to get a candidate root; if it is not a + root the minimal polynomial is computed; the answer is one of its + roots. + + Examples + ======== + + >>> from sympy.simplify.simplify import nthroot + >>> from sympy import sqrt + >>> nthroot(90 + 34*sqrt(7), 3) + sqrt(7) + 3 + + """ + expr = sympify(expr) + n = sympify(n) + p = expr**Rational(1, n) + if not n.is_integer: + return p + if not _is_sum_surds(expr): + return p + surds = [] + coeff_muls = [x.as_coeff_Mul() for x in expr.args] + for x, y in coeff_muls: + if not x.is_rational: + return p + if y is S.One: + continue + if not (y.is_Pow and y.exp == S.Half and y.base.is_integer): + return p + surds.append(y) + surds.sort() + surds = surds[:max_len] + if expr < 0 and n % 2 == 1: + p = (-expr)**Rational(1, n) + a = nsimplify(p, constants=surds) + res = a if _mexpand(a**n) == _mexpand(-expr) else p + return -res + a = nsimplify(p, constants=surds) + if _mexpand(a) is not _mexpand(p) and _mexpand(a**n) == _mexpand(expr): + return _mexpand(a) + expr = _nthroot_solve(expr, n, prec) + if expr is None: + return p + return expr + + +def nsimplify(expr, constants=(), tolerance=None, full=False, rational=None, + rational_conversion='base10'): + """ + Find a simple representation for a number or, if there are free symbols or + if ``rational=True``, then replace Floats with their Rational equivalents. If + no change is made and rational is not False then Floats will at least be + converted to Rationals. + + Explanation + =========== + + For numerical expressions, a simple formula that numerically matches the + given numerical expression is sought (and the input should be possible + to evalf to a precision of at least 30 digits). + + Optionally, a list of (rationally independent) constants to + include in the formula may be given. + + A lower tolerance may be set to find less exact matches. If no tolerance + is given then the least precise value will set the tolerance (e.g. Floats + default to 15 digits of precision, so would be tolerance=10**-15). + + With ``full=True``, a more extensive search is performed + (this is useful to find simpler numbers when the tolerance + is set low). + + When converting to rational, if rational_conversion='base10' (the default), then + convert floats to rationals using their base-10 (string) representation. + When rational_conversion='exact' it uses the exact, base-2 representation. + + Examples + ======== + + >>> from sympy import nsimplify, sqrt, GoldenRatio, exp, I, pi + >>> nsimplify(4/(1+sqrt(5)), [GoldenRatio]) + -2 + 2*GoldenRatio + >>> nsimplify((1/(exp(3*pi*I/5)+1))) + 1/2 - I*sqrt(sqrt(5)/10 + 1/4) + >>> nsimplify(I**I, [pi]) + exp(-pi/2) + >>> nsimplify(pi, tolerance=0.01) + 22/7 + + >>> nsimplify(0.333333333333333, rational=True, rational_conversion='exact') + 6004799503160655/18014398509481984 + >>> nsimplify(0.333333333333333, rational=True) + 1/3 + + See Also + ======== + + sympy.core.function.nfloat + + """ + try: + return sympify(as_int(expr)) + except (TypeError, ValueError): + pass + expr = sympify(expr).xreplace({ + Float('inf'): S.Infinity, + Float('-inf'): S.NegativeInfinity, + }) + if expr is S.Infinity or expr is S.NegativeInfinity: + return expr + if rational or expr.free_symbols: + return _real_to_rational(expr, tolerance, rational_conversion) + + # SymPy's default tolerance for Rationals is 15; other numbers may have + # lower tolerances set, so use them to pick the largest tolerance if None + # was given + if tolerance is None: + tolerance = 10**-min([15] + + [mpmath.libmp.libmpf.prec_to_dps(n._prec) + for n in expr.atoms(Float)]) + # XXX should prec be set independent of tolerance or should it be computed + # from tolerance? + prec = 30 + bprec = int(prec*3.33) + + constants_dict = {} + for constant in constants: + constant = sympify(constant) + v = constant.evalf(prec) + if not v.is_Float: + raise ValueError("constants must be real-valued") + constants_dict[str(constant)] = v._to_mpmath(bprec) + + exprval = expr.evalf(prec, chop=True) + re, im = exprval.as_real_imag() + + # safety check to make sure that this evaluated to a number + if not (re.is_Number and im.is_Number): + return expr + + def nsimplify_real(x): + orig = mpmath.mp.dps + xv = x._to_mpmath(bprec) + try: + # We'll be happy with low precision if a simple fraction + if not (tolerance or full): + mpmath.mp.dps = 15 + rat = mpmath.pslq([xv, 1]) + if rat is not None: + return Rational(-int(rat[1]), int(rat[0])) + mpmath.mp.dps = prec + newexpr = mpmath.identify(xv, constants=constants_dict, + tol=tolerance, full=full) + if not newexpr: + raise ValueError + if full: + newexpr = newexpr[0] + expr = sympify(newexpr) + if x and not expr: # don't let x become 0 + raise ValueError + if expr.is_finite is False and xv not in [mpmath.inf, mpmath.ninf]: + raise ValueError + return expr + finally: + # even though there are returns above, this is executed + # before leaving + mpmath.mp.dps = orig + try: + if re: + re = nsimplify_real(re) + if im: + im = nsimplify_real(im) + except ValueError: + if rational is None: + return _real_to_rational(expr, rational_conversion=rational_conversion) + return expr + + rv = re + im*S.ImaginaryUnit + # if there was a change or rational is explicitly not wanted + # return the value, else return the Rational representation + if rv != expr or rational is False: + return rv + return _real_to_rational(expr, rational_conversion=rational_conversion) + + +def _real_to_rational(expr, tolerance=None, rational_conversion='base10'): + """ + Replace all reals in expr with rationals. + + Examples + ======== + + >>> from sympy.simplify.simplify import _real_to_rational + >>> from sympy.abc import x + + >>> _real_to_rational(.76 + .1*x**.5) + sqrt(x)/10 + 19/25 + + If rational_conversion='base10', this uses the base-10 string. If + rational_conversion='exact', the exact, base-2 representation is used. + + >>> _real_to_rational(0.333333333333333, rational_conversion='exact') + 6004799503160655/18014398509481984 + >>> _real_to_rational(0.333333333333333) + 1/3 + + """ + expr = _sympify(expr) + inf = Float('inf') + p = expr + reps = {} + reduce_num = None + if tolerance is not None and tolerance < 1: + reduce_num = ceiling(1/tolerance) + for fl in p.atoms(Float): + key = fl + if reduce_num is not None: + r = Rational(fl).limit_denominator(reduce_num) + elif (tolerance is not None and tolerance >= 1 and + fl.is_Integer is False): + r = Rational(tolerance*round(fl/tolerance) + ).limit_denominator(int(tolerance)) + else: + if rational_conversion == 'exact': + r = Rational(fl) + reps[key] = r + continue + elif rational_conversion != 'base10': + raise ValueError("rational_conversion must be 'base10' or 'exact'") + + r = nsimplify(fl, rational=False) + # e.g. log(3).n() -> log(3) instead of a Rational + if fl and not r: + r = Rational(fl) + elif not r.is_Rational: + if fl in (inf, -inf): + r = S.ComplexInfinity + elif fl < 0: + fl = -fl + d = Pow(10, int(mpmath.log(fl)/mpmath.log(10))) + r = -Rational(str(fl/d))*d + elif fl > 0: + d = Pow(10, int(mpmath.log(fl)/mpmath.log(10))) + r = Rational(str(fl/d))*d + else: + r = S.Zero + reps[key] = r + return p.subs(reps, simultaneous=True) + + +def clear_coefficients(expr, rhs=S.Zero): + """Return `p, r` where `p` is the expression obtained when Rational + additive and multiplicative coefficients of `expr` have been stripped + away in a naive fashion (i.e. without simplification). The operations + needed to remove the coefficients will be applied to `rhs` and returned + as `r`. + + Examples + ======== + + >>> from sympy.simplify.simplify import clear_coefficients + >>> from sympy.abc import x, y + >>> from sympy import Dummy + >>> expr = 4*y*(6*x + 3) + >>> clear_coefficients(expr - 2) + (y*(2*x + 1), 1/6) + + When solving 2 or more expressions like `expr = a`, + `expr = b`, etc..., it is advantageous to provide a Dummy symbol + for `rhs` and simply replace it with `a`, `b`, etc... in `r`. + + >>> rhs = Dummy('rhs') + >>> clear_coefficients(expr, rhs) + (y*(2*x + 1), _rhs/12) + >>> _[1].subs(rhs, 2) + 1/6 + """ + was = None + free = expr.free_symbols + if expr.is_Rational: + return (S.Zero, rhs - expr) + while expr and was != expr: + was = expr + m, expr = ( + expr.as_content_primitive() + if free else + factor_terms(expr).as_coeff_Mul(rational=True)) + rhs /= m + c, expr = expr.as_coeff_Add(rational=True) + rhs -= c + expr = signsimp(expr, evaluate = False) + if expr.could_extract_minus_sign(): + expr = -expr + rhs = -rhs + return expr, rhs + +def nc_simplify(expr, deep=True): + ''' + Simplify a non-commutative expression composed of multiplication + and raising to a power by grouping repeated subterms into one power. + Priority is given to simplifications that give the fewest number + of arguments in the end (for example, in a*b*a*b*c*a*b*c simplifying + to (a*b)**2*c*a*b*c gives 5 arguments while a*b*(a*b*c)**2 has 3). + If ``expr`` is a sum of such terms, the sum of the simplified terms + is returned. + + Keyword argument ``deep`` controls whether or not subexpressions + nested deeper inside the main expression are simplified. See examples + below. Setting `deep` to `False` can save time on nested expressions + that do not need simplifying on all levels. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.simplify.simplify import nc_simplify + >>> a, b, c = symbols("a b c", commutative=False) + >>> nc_simplify(a*b*a*b*c*a*b*c) + a*b*(a*b*c)**2 + >>> expr = a**2*b*a**4*b*a**4 + >>> nc_simplify(expr) + a**2*(b*a**4)**2 + >>> nc_simplify(a*b*a*b*c**2*(a*b)**2*c**2) + ((a*b)**2*c**2)**2 + >>> nc_simplify(a*b*a*b + 2*a*c*a**2*c*a**2*c*a) + (a*b)**2 + 2*(a*c*a)**3 + >>> nc_simplify(b**-1*a**-1*(a*b)**2) + a*b + >>> nc_simplify(a**-1*b**-1*c*a) + (b*a)**(-1)*c*a + >>> expr = (a*b*a*b)**2*a*c*a*c + >>> nc_simplify(expr) + (a*b)**4*(a*c)**2 + >>> nc_simplify(expr, deep=False) + (a*b*a*b)**2*(a*c)**2 + + ''' + if isinstance(expr, MatrixExpr): + expr = expr.doit(inv_expand=False) + _Add, _Mul, _Pow, _Symbol = MatAdd, MatMul, MatPow, MatrixSymbol + else: + _Add, _Mul, _Pow, _Symbol = Add, Mul, Pow, Symbol + + # =========== Auxiliary functions ======================== + def _overlaps(args): + # Calculate a list of lists m such that m[i][j] contains the lengths + # of all possible overlaps between args[:i+1] and args[i+1+j:]. + # An overlap is a suffix of the prefix that matches a prefix + # of the suffix. + # For example, let expr=c*a*b*a*b*a*b*a*b. Then m[3][0] contains + # the lengths of overlaps of c*a*b*a*b with a*b*a*b. The overlaps + # are a*b*a*b, a*b and the empty word so that m[3][0]=[4,2,0]. + # All overlaps rather than only the longest one are recorded + # because this information helps calculate other overlap lengths. + m = [[([1, 0] if a == args[0] else [0]) for a in args[1:]]] + for i in range(1, len(args)): + overlaps = [] + j = 0 + for j in range(len(args) - i - 1): + overlap = [] + for v in m[i-1][j+1]: + if j + i + 1 + v < len(args) and args[i] == args[j+i+1+v]: + overlap.append(v + 1) + overlap += [0] + overlaps.append(overlap) + m.append(overlaps) + return m + + def _reduce_inverses(_args): + # replace consecutive negative powers by an inverse + # of a product of positive powers, e.g. a**-1*b**-1*c + # will simplify to (a*b)**-1*c; + # return that new args list and the number of negative + # powers in it (inv_tot) + inv_tot = 0 # total number of inverses + inverses = [] + args = [] + for arg in _args: + if isinstance(arg, _Pow) and arg.args[1].is_extended_negative: + inverses = [arg**-1] + inverses + inv_tot += 1 + else: + if len(inverses) == 1: + args.append(inverses[0]**-1) + elif len(inverses) > 1: + args.append(_Pow(_Mul(*inverses), -1)) + inv_tot -= len(inverses) - 1 + inverses = [] + args.append(arg) + if inverses: + args.append(_Pow(_Mul(*inverses), -1)) + inv_tot -= len(inverses) - 1 + return inv_tot, tuple(args) + + def get_score(s): + # compute the number of arguments of s + # (including in nested expressions) overall + # but ignore exponents + if isinstance(s, _Pow): + return get_score(s.args[0]) + elif isinstance(s, (_Add, _Mul)): + return sum(get_score(a) for a in s.args) + return 1 + + def compare(s, alt_s): + # compare two possible simplifications and return a + # "better" one + if s != alt_s and get_score(alt_s) < get_score(s): + return alt_s + return s + # ======================================================== + + if not isinstance(expr, (_Add, _Mul, _Pow)) or expr.is_commutative: + return expr + args = expr.args[:] + if isinstance(expr, _Pow): + if deep: + return _Pow(nc_simplify(args[0]), args[1]).doit() + else: + return expr + elif isinstance(expr, _Add): + return _Add(*[nc_simplify(a, deep=deep) for a in args]).doit() + else: + # get the non-commutative part + c_args, args = expr.args_cnc() + com_coeff = Mul(*c_args) + if not equal_valued(com_coeff, 1): + return com_coeff*nc_simplify(expr/com_coeff, deep=deep) + + inv_tot, args = _reduce_inverses(args) + # if most arguments are negative, work with the inverse + # of the expression, e.g. a**-1*b*a**-1*c**-1 will become + # (c*a*b**-1*a)**-1 at the end so can work with c*a*b**-1*a + invert = False + if inv_tot > len(args)/2: + invert = True + args = [a**-1 for a in args[::-1]] + + if deep: + args = tuple(nc_simplify(a) for a in args) + + m = _overlaps(args) + + # simps will be {subterm: end} where `end` is the ending + # index of a sequence of repetitions of subterm; + # this is for not wasting time with subterms that are part + # of longer, already considered sequences + simps = {} + + post = 1 + pre = 1 + + # the simplification coefficient is the number of + # arguments by which contracting a given sequence + # would reduce the word; e.g. in a*b*a*b*c*a*b*c, + # contracting a*b*a*b to (a*b)**2 removes 3 arguments + # while a*b*c*a*b*c to (a*b*c)**2 removes 6. It's + # better to contract the latter so simplification + # with a maximum simplification coefficient will be chosen + max_simp_coeff = 0 + simp = None # information about future simplification + + for i in range(1, len(args)): + simp_coeff = 0 + l = 0 # length of a subterm + p = 0 # the power of a subterm + if i < len(args) - 1: + rep = m[i][0] + start = i # starting index of the repeated sequence + end = i+1 # ending index of the repeated sequence + if i == len(args)-1 or rep == [0]: + # no subterm is repeated at this stage, at least as + # far as the arguments are concerned - there may be + # a repetition if powers are taken into account + if (isinstance(args[i], _Pow) and + not isinstance(args[i].args[0], _Symbol)): + subterm = args[i].args[0].args + l = len(subterm) + if args[i-l:i] == subterm: + # e.g. a*b in a*b*(a*b)**2 is not repeated + # in args (= [a, b, (a*b)**2]) but it + # can be matched here + p += 1 + start -= l + if args[i+1:i+1+l] == subterm: + # e.g. a*b in (a*b)**2*a*b + p += 1 + end += l + if p: + p += args[i].args[1] + else: + continue + else: + l = rep[0] # length of the longest repeated subterm at this point + start -= l - 1 + subterm = args[start:end] + p = 2 + end += l + + if subterm in simps and simps[subterm] >= start: + # the subterm is part of a sequence that + # has already been considered + continue + + # count how many times it's repeated + while end < len(args): + if l in m[end-1][0]: + p += 1 + end += l + elif isinstance(args[end], _Pow) and args[end].args[0].args == subterm: + # for cases like a*b*a*b*(a*b)**2*a*b + p += args[end].args[1] + end += 1 + else: + break + + # see if another match can be made, e.g. + # for b*a**2 in b*a**2*b*a**3 or a*b in + # a**2*b*a*b + + pre_exp = 0 + pre_arg = 1 + if start - l >= 0 and args[start-l+1:start] == subterm[1:]: + if isinstance(subterm[0], _Pow): + pre_arg = subterm[0].args[0] + exp = subterm[0].args[1] + else: + pre_arg = subterm[0] + exp = 1 + if isinstance(args[start-l], _Pow) and args[start-l].args[0] == pre_arg: + pre_exp = args[start-l].args[1] - exp + start -= l + p += 1 + elif args[start-l] == pre_arg: + pre_exp = 1 - exp + start -= l + p += 1 + + post_exp = 0 + post_arg = 1 + if end + l - 1 < len(args) and args[end:end+l-1] == subterm[:-1]: + if isinstance(subterm[-1], _Pow): + post_arg = subterm[-1].args[0] + exp = subterm[-1].args[1] + else: + post_arg = subterm[-1] + exp = 1 + if isinstance(args[end+l-1], _Pow) and args[end+l-1].args[0] == post_arg: + post_exp = args[end+l-1].args[1] - exp + end += l + p += 1 + elif args[end+l-1] == post_arg: + post_exp = 1 - exp + end += l + p += 1 + + # Consider a*b*a**2*b*a**2*b*a: + # b*a**2 is explicitly repeated, but note + # that in this case a*b*a is also repeated + # so there are two possible simplifications: + # a*(b*a**2)**3*a**-1 or (a*b*a)**3 + # The latter is obviously simpler. + # But in a*b*a**2*b**2*a**2 the simplifications are + # a*(b*a**2)**2 and (a*b*a)**3*a in which case + # it's better to stick with the shorter subterm + if post_exp and exp % 2 == 0 and start > 0: + exp = exp/2 + _pre_exp = 1 + _post_exp = 1 + if isinstance(args[start-1], _Pow) and args[start-1].args[0] == post_arg: + _post_exp = post_exp + exp + _pre_exp = args[start-1].args[1] - exp + elif args[start-1] == post_arg: + _post_exp = post_exp + exp + _pre_exp = 1 - exp + if _pre_exp == 0 or _post_exp == 0: + if not pre_exp: + start -= 1 + post_exp = _post_exp + pre_exp = _pre_exp + pre_arg = post_arg + subterm = (post_arg**exp,) + subterm[:-1] + (post_arg**exp,) + + simp_coeff += end-start + + if post_exp: + simp_coeff -= 1 + if pre_exp: + simp_coeff -= 1 + + simps[subterm] = end + + if simp_coeff > max_simp_coeff: + max_simp_coeff = simp_coeff + simp = (start, _Mul(*subterm), p, end, l) + pre = pre_arg**pre_exp + post = post_arg**post_exp + + if simp: + subterm = _Pow(nc_simplify(simp[1], deep=deep), simp[2]) + pre = nc_simplify(_Mul(*args[:simp[0]])*pre, deep=deep) + post = post*nc_simplify(_Mul(*args[simp[3]:]), deep=deep) + simp = pre*subterm*post + if pre != 1 or post != 1: + # new simplifications may be possible but no need + # to recurse over arguments + simp = nc_simplify(simp, deep=False) + else: + simp = _Mul(*args) + + if invert: + simp = _Pow(simp, -1) + + # see if factor_nc(expr) is simplified better + if not isinstance(expr, MatrixExpr): + f_expr = factor_nc(expr) + if f_expr != expr: + alt_simp = nc_simplify(f_expr, deep=deep) + simp = compare(simp, alt_simp) + else: + simp = simp.doit(inv_expand=False) + return simp + + +def dotprodsimp(expr, withsimp=False): + """Simplification for a sum of products targeted at the kind of blowup that + occurs during summation of products. Intended to reduce expression blowup + during matrix multiplication or other similar operations. Only works with + algebraic expressions and does not recurse into non. + + Parameters + ========== + + withsimp : bool, optional + Specifies whether a flag should be returned along with the expression + to indicate roughly whether simplification was successful. It is used + in ``MatrixArithmetic._eval_pow_by_recursion`` to avoid attempting to + simplify an expression repetitively which does not simplify. + """ + + def count_ops_alg(expr): + """Optimized count algebraic operations with no recursion into + non-algebraic args that ``core.function.count_ops`` does. Also returns + whether rational functions may be present according to negative + exponents of powers or non-number fractions. + + Returns + ======= + + ops, ratfunc : int, bool + ``ops`` is the number of algebraic operations starting at the top + level expression (not recursing into non-alg children). ``ratfunc`` + specifies whether the expression MAY contain rational functions + which ``cancel`` MIGHT optimize. + """ + + ops = 0 + args = [expr] + ratfunc = False + + while args: + a = args.pop() + + if not isinstance(a, Basic): + continue + + if a.is_Rational: + if a is not S.One: # -1/3 = NEG + DIV + ops += bool (a.p < 0) + bool (a.q != 1) + + elif a.is_Mul: + if a.could_extract_minus_sign(): + ops += 1 + if a.args[0] is S.NegativeOne: + a = a.as_two_terms()[1] + else: + a = -a + + n, d = fraction(a) + + if n.is_Integer: + ops += 1 + bool (n < 0) + args.append(d) # won't be -Mul but could be Add + + elif d is not S.One: + if not d.is_Integer: + args.append(d) + ratfunc=True + + ops += 1 + args.append(n) # could be -Mul + + else: + ops += len(a.args) - 1 + args.extend(a.args) + + elif a.is_Add: + laargs = len(a.args) + negs = 0 + + for ai in a.args: + if ai.could_extract_minus_sign(): + negs += 1 + ai = -ai + args.append(ai) + + ops += laargs - (negs != laargs) # -x - y = NEG + SUB + + elif a.is_Pow: + ops += 1 + args.append(a.base) + + if not ratfunc: + ratfunc = a.exp.is_negative is not False + + return ops, ratfunc + + def nonalg_subs_dummies(expr, dummies): + """Substitute dummy variables for non-algebraic expressions to avoid + evaluation of non-algebraic terms that ``polys.polytools.cancel`` does. + """ + + if not expr.args: + return expr + + if expr.is_Add or expr.is_Mul or expr.is_Pow: + args = None + + for i, a in enumerate(expr.args): + c = nonalg_subs_dummies(a, dummies) + + if c is a: + continue + + if args is None: + args = list(expr.args) + + args[i] = c + + if args is None: + return expr + + return expr.func(*args) + + return dummies.setdefault(expr, Dummy()) + + simplified = False # doesn't really mean simplified, rather "can simplify again" + + if isinstance(expr, Basic) and (expr.is_Add or expr.is_Mul or expr.is_Pow): + expr2 = expr.expand(deep=True, modulus=None, power_base=False, + power_exp=False, mul=True, log=False, multinomial=True, basic=False) + + if expr2 != expr: + expr = expr2 + simplified = True + + exprops, ratfunc = count_ops_alg(expr) + + if exprops >= 6: # empirically tested cutoff for expensive simplification + if ratfunc: + dummies = {} + expr2 = nonalg_subs_dummies(expr, dummies) + + if expr2 is expr or count_ops_alg(expr2)[0] >= 6: # check again after substitution + expr3 = cancel(expr2) + + if expr3 != expr2: + expr = expr3.subs([(d, e) for e, d in dummies.items()]) + simplified = True + + # very special case: x/(x-1) - 1/(x-1) -> 1 + elif (exprops == 5 and expr.is_Add and expr.args [0].is_Mul and + expr.args [1].is_Mul and expr.args [0].args [-1].is_Pow and + expr.args [1].args [-1].is_Pow and + expr.args [0].args [-1].exp is S.NegativeOne and + expr.args [1].args [-1].exp is S.NegativeOne): + + expr2 = together (expr) + expr2ops = count_ops_alg(expr2)[0] + + if expr2ops < exprops: + expr = expr2 + simplified = True + + else: + simplified = True + + return (expr, simplified) if withsimp else expr + + +bottom_up = deprecated( + """ + Using bottom_up from the sympy.simplify.simplify submodule is + deprecated. + + Instead, use bottom_up from the top-level sympy namespace, like + + sympy.bottom_up + """, + deprecated_since_version="1.10", + active_deprecations_target="deprecated-traversal-functions-moved", +)(_bottom_up) + + +# XXX: This function really should either be private API or exported in the +# top-level sympy/__init__.py +walk = deprecated( + """ + Using walk from the sympy.simplify.simplify submodule is + deprecated. + + Instead, use walk from sympy.core.traversal.walk + """, + deprecated_since_version="1.10", + active_deprecations_target="deprecated-traversal-functions-moved", +)(_walk) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/sqrtdenest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/sqrtdenest.py new file mode 100644 index 0000000000000000000000000000000000000000..d266de7e62a4b7d37a2109f7091ff91e4df7c79d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/sqrtdenest.py @@ -0,0 +1,678 @@ +from sympy.core import Add, Expr, Mul, S, sympify +from sympy.core.function import _mexpand, count_ops, expand_mul +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Dummy +from sympy.functions import root, sign, sqrt +from sympy.polys import Poly, PolynomialError + + +def is_sqrt(expr): + """Return True if expr is a sqrt, otherwise False.""" + + return expr.is_Pow and expr.exp.is_Rational and abs(expr.exp) is S.Half + + +def sqrt_depth(p) -> int: + """Return the maximum depth of any square root argument of p. + + >>> from sympy.functions.elementary.miscellaneous import sqrt + >>> from sympy.simplify.sqrtdenest import sqrt_depth + + Neither of these square roots contains any other square roots + so the depth is 1: + + >>> sqrt_depth(1 + sqrt(2)*(1 + sqrt(3))) + 1 + + The sqrt(3) is contained within a square root so the depth is + 2: + + >>> sqrt_depth(1 + sqrt(2)*sqrt(1 + sqrt(3))) + 2 + """ + if p is S.ImaginaryUnit: + return 1 + if p.is_Atom: + return 0 + if p.is_Add or p.is_Mul: + return max(sqrt_depth(x) for x in p.args) + if is_sqrt(p): + return sqrt_depth(p.base) + 1 + return 0 + + +def is_algebraic(p): + """Return True if p is comprised of only Rationals or square roots + of Rationals and algebraic operations. + + Examples + ======== + + >>> from sympy.functions.elementary.miscellaneous import sqrt + >>> from sympy.simplify.sqrtdenest import is_algebraic + >>> from sympy import cos + >>> is_algebraic(sqrt(2)*(3/(sqrt(7) + sqrt(5)*sqrt(2)))) + True + >>> is_algebraic(sqrt(2)*(3/(sqrt(7) + sqrt(5)*cos(2)))) + False + """ + + if p.is_Rational: + return True + elif p.is_Atom: + return False + elif is_sqrt(p) or p.is_Pow and p.exp.is_Integer: + return is_algebraic(p.base) + elif p.is_Add or p.is_Mul: + return all(is_algebraic(x) for x in p.args) + else: + return False + + +def _subsets(n): + """ + Returns all possible subsets of the set (0, 1, ..., n-1) except the + empty set, listed in reversed lexicographical order according to binary + representation, so that the case of the fourth root is treated last. + + Examples + ======== + + >>> from sympy.simplify.sqrtdenest import _subsets + >>> _subsets(2) + [[1, 0], [0, 1], [1, 1]] + + """ + if n == 1: + a = [[1]] + elif n == 2: + a = [[1, 0], [0, 1], [1, 1]] + elif n == 3: + a = [[1, 0, 0], [0, 1, 0], [1, 1, 0], + [0, 0, 1], [1, 0, 1], [0, 1, 1], [1, 1, 1]] + else: + b = _subsets(n - 1) + a0 = [x + [0] for x in b] + a1 = [x + [1] for x in b] + a = a0 + [[0]*(n - 1) + [1]] + a1 + return a + + +def sqrtdenest(expr, max_iter=3): + """Denests sqrts in an expression that contain other square roots + if possible, otherwise returns the expr unchanged. This is based on the + algorithms of [1]. + + Examples + ======== + + >>> from sympy.simplify.sqrtdenest import sqrtdenest + >>> from sympy import sqrt + >>> sqrtdenest(sqrt(5 + 2 * sqrt(6))) + sqrt(2) + sqrt(3) + + See Also + ======== + + sympy.solvers.solvers.unrad + + References + ========== + + .. [1] https://web.archive.org/web/20210806201615/https://researcher.watson.ibm.com/researcher/files/us-fagin/symb85.pdf + + .. [2] D. J. Jeffrey and A. D. Rich, 'Symplifying Square Roots of Square Roots + by Denesting' (available at https://www.cybertester.com/data/denest.pdf) + + """ + expr = expand_mul(expr) + for i in range(max_iter): + z = _sqrtdenest0(expr) + if expr == z: + return expr + expr = z + return expr + + +def _sqrt_match(p): + """Return [a, b, r] for p.match(a + b*sqrt(r)) where, in addition to + matching, sqrt(r) also has then maximal sqrt_depth among addends of p. + + Examples + ======== + + >>> from sympy.functions.elementary.miscellaneous import sqrt + >>> from sympy.simplify.sqrtdenest import _sqrt_match + >>> _sqrt_match(1 + sqrt(2) + sqrt(2)*sqrt(3) + 2*sqrt(1+sqrt(5))) + [1 + sqrt(2) + sqrt(6), 2, 1 + sqrt(5)] + """ + from sympy.simplify.radsimp import split_surds + + p = _mexpand(p) + if p.is_Number: + res = (p, S.Zero, S.Zero) + elif p.is_Add: + pargs = sorted(p.args, key=default_sort_key) + sqargs = [x**2 for x in pargs] + if all(sq.is_Rational and sq.is_positive for sq in sqargs): + r, b, a = split_surds(p) + res = a, b, r + return list(res) + # to make the process canonical, the argument is included in the tuple + # so when the max is selected, it will be the largest arg having a + # given depth + v = [(sqrt_depth(x), x, i) for i, x in enumerate(pargs)] + nmax = max(v, key=default_sort_key) + if nmax[0] == 0: + res = [] + else: + # select r + depth, _, i = nmax + r = pargs.pop(i) + v.pop(i) + b = S.One + if r.is_Mul: + bv = [] + rv = [] + for x in r.args: + if sqrt_depth(x) < depth: + bv.append(x) + else: + rv.append(x) + b = Mul._from_args(bv) + r = Mul._from_args(rv) + # collect terms containing r + a1 = [] + b1 = [b] + for x in v: + if x[0] < depth: + a1.append(x[1]) + else: + x1 = x[1] + if x1 == r: + b1.append(1) + else: + if x1.is_Mul: + x1args = list(x1.args) + if r in x1args: + x1args.remove(r) + b1.append(Mul(*x1args)) + else: + a1.append(x[1]) + else: + a1.append(x[1]) + a = Add(*a1) + b = Add(*b1) + res = (a, b, r**2) + else: + b, r = p.as_coeff_Mul() + if is_sqrt(r): + res = (S.Zero, b, r**2) + else: + res = [] + return list(res) + + +class SqrtdenestStopIteration(StopIteration): + pass + + +def _sqrtdenest0(expr): + """Returns expr after denesting its arguments.""" + + if is_sqrt(expr): + n, d = expr.as_numer_denom() + if d is S.One: # n is a square root + if n.base.is_Add: + args = sorted(n.base.args, key=default_sort_key) + if len(args) > 2 and all((x**2).is_Integer for x in args): + try: + return _sqrtdenest_rec(n) + except SqrtdenestStopIteration: + pass + expr = sqrt(_mexpand(Add(*[_sqrtdenest0(x) for x in args]))) + return _sqrtdenest1(expr) + else: + n, d = [_sqrtdenest0(i) for i in (n, d)] + return n/d + + if isinstance(expr, Add): + cs = [] + args = [] + for arg in expr.args: + c, a = arg.as_coeff_Mul() + cs.append(c) + args.append(a) + + if all(c.is_Rational for c in cs) and all(is_sqrt(arg) for arg in args): + return _sqrt_ratcomb(cs, args) + + if isinstance(expr, Expr): + args = expr.args + if args: + return expr.func(*[_sqrtdenest0(a) for a in args]) + return expr + + +def _sqrtdenest_rec(expr): + """Helper that denests the square root of three or more surds. + + Explanation + =========== + + It returns the denested expression; if it cannot be denested it + throws SqrtdenestStopIteration + + Algorithm: expr.base is in the extension Q_m = Q(sqrt(r_1),..,sqrt(r_k)); + split expr.base = a + b*sqrt(r_k), where `a` and `b` are on + Q_(m-1) = Q(sqrt(r_1),..,sqrt(r_(k-1))); then a**2 - b**2*r_k is + on Q_(m-1); denest sqrt(a**2 - b**2*r_k) and so on. + See [1], section 6. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.sqrtdenest import _sqrtdenest_rec + >>> _sqrtdenest_rec(sqrt(-72*sqrt(2) + 158*sqrt(5) + 498)) + -sqrt(10) + sqrt(2) + 9 + 9*sqrt(5) + >>> w=-6*sqrt(55)-6*sqrt(35)-2*sqrt(22)-2*sqrt(14)+2*sqrt(77)+6*sqrt(10)+65 + >>> _sqrtdenest_rec(sqrt(w)) + -sqrt(11) - sqrt(7) + sqrt(2) + 3*sqrt(5) + """ + from sympy.simplify.radsimp import radsimp, rad_rationalize, split_surds + if not expr.is_Pow: + return sqrtdenest(expr) + if expr.base < 0: + return sqrt(-1)*_sqrtdenest_rec(sqrt(-expr.base)) + g, a, b = split_surds(expr.base) + a = a*sqrt(g) + if a < b: + a, b = b, a + c2 = _mexpand(a**2 - b**2) + if len(c2.args) > 2: + g, a1, b1 = split_surds(c2) + a1 = a1*sqrt(g) + if a1 < b1: + a1, b1 = b1, a1 + c2_1 = _mexpand(a1**2 - b1**2) + c_1 = _sqrtdenest_rec(sqrt(c2_1)) + d_1 = _sqrtdenest_rec(sqrt(a1 + c_1)) + num, den = rad_rationalize(b1, d_1) + c = _mexpand(d_1/sqrt(2) + num/(den*sqrt(2))) + else: + c = _sqrtdenest1(sqrt(c2)) + + if sqrt_depth(c) > 1: + raise SqrtdenestStopIteration + ac = a + c + if len(ac.args) >= len(expr.args): + if count_ops(ac) >= count_ops(expr.base): + raise SqrtdenestStopIteration + d = sqrtdenest(sqrt(ac)) + if sqrt_depth(d) > 1: + raise SqrtdenestStopIteration + num, den = rad_rationalize(b, d) + r = d/sqrt(2) + num/(den*sqrt(2)) + r = radsimp(r) + return _mexpand(r) + + +def _sqrtdenest1(expr, denester=True): + """Return denested expr after denesting with simpler methods or, that + failing, using the denester.""" + + from sympy.simplify.simplify import radsimp + + if not is_sqrt(expr): + return expr + + a = expr.base + if a.is_Atom: + return expr + val = _sqrt_match(a) + if not val: + return expr + + a, b, r = val + # try a quick numeric denesting + d2 = _mexpand(a**2 - b**2*r) + if d2.is_Rational: + if d2.is_positive: + z = _sqrt_numeric_denest(a, b, r, d2) + if z is not None: + return z + else: + # fourth root case + # sqrtdenest(sqrt(3 + 2*sqrt(3))) = + # sqrt(2)*3**(1/4)/2 + sqrt(2)*3**(3/4)/2 + dr2 = _mexpand(-d2*r) + dr = sqrt(dr2) + if dr.is_Rational: + z = _sqrt_numeric_denest(_mexpand(b*r), a, r, dr2) + if z is not None: + return z/root(r, 4) + + else: + z = _sqrt_symbolic_denest(a, b, r) + if z is not None: + return z + + if not denester or not is_algebraic(expr): + return expr + + res = sqrt_biquadratic_denest(expr, a, b, r, d2) + if res: + return res + + # now call to the denester + av0 = [a, b, r, d2] + z = _denester([radsimp(expr**2)], av0, 0, sqrt_depth(expr))[0] + if av0[1] is None: + return expr + if z is not None: + if sqrt_depth(z) == sqrt_depth(expr) and count_ops(z) > count_ops(expr): + return expr + return z + return expr + + +def _sqrt_symbolic_denest(a, b, r): + """Given an expression, sqrt(a + b*sqrt(b)), return the denested + expression or None. + + Explanation + =========== + + If r = ra + rb*sqrt(rr), try replacing sqrt(rr) in ``a`` with + (y**2 - ra)/rb, and if the result is a quadratic, ca*y**2 + cb*y + cc, and + (cb + b)**2 - 4*ca*cc is 0, then sqrt(a + b*sqrt(r)) can be rewritten as + sqrt(ca*(sqrt(r) + (cb + b)/(2*ca))**2). + + Examples + ======== + + >>> from sympy.simplify.sqrtdenest import _sqrt_symbolic_denest, sqrtdenest + >>> from sympy import sqrt, Symbol + >>> from sympy.abc import x + + >>> a, b, r = 16 - 2*sqrt(29), 2, -10*sqrt(29) + 55 + >>> _sqrt_symbolic_denest(a, b, r) + sqrt(11 - 2*sqrt(29)) + sqrt(5) + + If the expression is numeric, it will be simplified: + + >>> w = sqrt(sqrt(sqrt(3) + 1) + 1) + 1 + sqrt(2) + >>> sqrtdenest(sqrt((w**2).expand())) + 1 + sqrt(2) + sqrt(1 + sqrt(1 + sqrt(3))) + + Otherwise, it will only be simplified if assumptions allow: + + >>> w = w.subs(sqrt(3), sqrt(x + 3)) + >>> sqrtdenest(sqrt((w**2).expand())) + sqrt((sqrt(sqrt(sqrt(x + 3) + 1) + 1) + 1 + sqrt(2))**2) + + Notice that the argument of the sqrt is a square. If x is made positive + then the sqrt of the square is resolved: + + >>> _.subs(x, Symbol('x', positive=True)) + sqrt(sqrt(sqrt(x + 3) + 1) + 1) + 1 + sqrt(2) + """ + + a, b, r = map(sympify, (a, b, r)) + rval = _sqrt_match(r) + if not rval: + return None + ra, rb, rr = rval + if rb: + y = Dummy('y', positive=True) + try: + newa = Poly(a.subs(sqrt(rr), (y**2 - ra)/rb), y) + except PolynomialError: + return None + if newa.degree() == 2: + ca, cb, cc = newa.all_coeffs() + cb += b + if _mexpand(cb**2 - 4*ca*cc).equals(0): + z = sqrt(ca*(sqrt(r) + cb/(2*ca))**2) + if z.is_number: + z = _mexpand(Mul._from_args(z.as_content_primitive())) + return z + + +def _sqrt_numeric_denest(a, b, r, d2): + r"""Helper that denest + $\sqrt{a + b \sqrt{r}}, d^2 = a^2 - b^2 r > 0$ + + If it cannot be denested, it returns ``None``. + """ + d = sqrt(d2) + s = a + d + # sqrt_depth(res) <= sqrt_depth(s) + 1 + # sqrt_depth(expr) = sqrt_depth(r) + 2 + # there is denesting if sqrt_depth(s) + 1 < sqrt_depth(r) + 2 + # if s**2 is Number there is a fourth root + if sqrt_depth(s) < sqrt_depth(r) + 1 or (s**2).is_Rational: + s1, s2 = sign(s), sign(b) + if s1 == s2 == -1: + s1 = s2 = 1 + res = (s1 * sqrt(a + d) + s2 * sqrt(a - d)) * sqrt(2) / 2 + return res.expand() + + +def sqrt_biquadratic_denest(expr, a, b, r, d2): + """denest expr = sqrt(a + b*sqrt(r)) + where a, b, r are linear combinations of square roots of + positive rationals on the rationals (SQRR) and r > 0, b != 0, + d2 = a**2 - b**2*r > 0 + + If it cannot denest it returns None. + + Explanation + =========== + + Search for a solution A of type SQRR of the biquadratic equation + 4*A**4 - 4*a*A**2 + b**2*r = 0 (1) + sqd = sqrt(a**2 - b**2*r) + Choosing the sqrt to be positive, the possible solutions are + A = sqrt(a/2 +/- sqd/2) + Since a, b, r are SQRR, then a**2 - b**2*r is a SQRR, + so if sqd can be denested, it is done by + _sqrtdenest_rec, and the result is a SQRR. + Similarly for A. + Examples of solutions (in both cases a and sqd are positive): + + Example of expr with solution sqrt(a/2 + sqd/2) but not + solution sqrt(a/2 - sqd/2): + expr = sqrt(-sqrt(15) - sqrt(2)*sqrt(-sqrt(5) + 5) - sqrt(3) + 8) + a = -sqrt(15) - sqrt(3) + 8; sqd = -2*sqrt(5) - 2 + 4*sqrt(3) + + Example of expr with solution sqrt(a/2 - sqd/2) but not + solution sqrt(a/2 + sqd/2): + w = 2 + r2 + r3 + (1 + r3)*sqrt(2 + r2 + 5*r3) + expr = sqrt((w**2).expand()) + a = 4*sqrt(6) + 8*sqrt(2) + 47 + 28*sqrt(3) + sqd = 29 + 20*sqrt(3) + + Define B = b/2*A; eq.(1) implies a = A**2 + B**2*r; then + expr**2 = a + b*sqrt(r) = (A + B*sqrt(r))**2 + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.sqrtdenest import _sqrt_match, sqrt_biquadratic_denest + >>> z = sqrt((2*sqrt(2) + 4)*sqrt(2 + sqrt(2)) + 5*sqrt(2) + 8) + >>> a, b, r = _sqrt_match(z**2) + >>> d2 = a**2 - b**2*r + >>> sqrt_biquadratic_denest(z, a, b, r, d2) + sqrt(2) + sqrt(sqrt(2) + 2) + 2 + """ + from sympy.simplify.radsimp import radsimp, rad_rationalize + if r <= 0 or d2 < 0 or not b or sqrt_depth(expr.base) < 2: + return None + for x in (a, b, r): + for y in x.args: + y2 = y**2 + if not y2.is_Integer or not y2.is_positive: + return None + sqd = _mexpand(sqrtdenest(sqrt(radsimp(d2)))) + if sqrt_depth(sqd) > 1: + return None + x1, x2 = [a/2 + sqd/2, a/2 - sqd/2] + # look for a solution A with depth 1 + for x in (x1, x2): + A = sqrtdenest(sqrt(x)) + if sqrt_depth(A) > 1: + continue + Bn, Bd = rad_rationalize(b, _mexpand(2*A)) + B = Bn/Bd + z = A + B*sqrt(r) + if z < 0: + z = -z + return _mexpand(z) + return None + + +def _denester(nested, av0, h, max_depth_level): + """Denests a list of expressions that contain nested square roots. + + Explanation + =========== + + Algorithm based on . + + It is assumed that all of the elements of 'nested' share the same + bottom-level radicand. (This is stated in the paper, on page 177, in + the paragraph immediately preceding the algorithm.) + + When evaluating all of the arguments in parallel, the bottom-level + radicand only needs to be denested once. This means that calling + _denester with x arguments results in a recursive invocation with x+1 + arguments; hence _denester has polynomial complexity. + + However, if the arguments were evaluated separately, each call would + result in two recursive invocations, and the algorithm would have + exponential complexity. + + This is discussed in the paper in the middle paragraph of page 179. + """ + from sympy.simplify.simplify import radsimp + if h > max_depth_level: + return None, None + if av0[1] is None: + return None, None + if (av0[0] is None and + all(n.is_Number for n in nested)): # no arguments are nested + for f in _subsets(len(nested)): # test subset 'f' of nested + p = _mexpand(Mul(*[nested[i] for i in range(len(f)) if f[i]])) + if f.count(1) > 1 and f[-1]: + p = -p + sqp = sqrt(p) + if sqp.is_Rational: + return sqp, f # got a perfect square so return its square root. + # Otherwise, return the radicand from the previous invocation. + return sqrt(nested[-1]), [0]*len(nested) + else: + R = None + if av0[0] is not None: + values = [av0[:2]] + R = av0[2] + nested2 = [av0[3], R] + av0[0] = None + else: + values = list(filter(None, [_sqrt_match(expr) for expr in nested])) + for v in values: + if v[2]: # Since if b=0, r is not defined + if R is not None: + if R != v[2]: + av0[1] = None + return None, None + else: + R = v[2] + if R is None: + # return the radicand from the previous invocation + return sqrt(nested[-1]), [0]*len(nested) + nested2 = [_mexpand(v[0]**2) - + _mexpand(R*v[1]**2) for v in values] + [R] + d, f = _denester(nested2, av0, h + 1, max_depth_level) + if not f: + return None, None + if not any(f[i] for i in range(len(nested))): + v = values[-1] + return sqrt(v[0] + _mexpand(v[1]*d)), f + else: + p = Mul(*[nested[i] for i in range(len(nested)) if f[i]]) + v = _sqrt_match(p) + if 1 in f and f.index(1) < len(nested) - 1 and f[len(nested) - 1]: + v[0] = -v[0] + v[1] = -v[1] + if not f[len(nested)]: # Solution denests with square roots + vad = _mexpand(v[0] + d) + if vad <= 0: + # return the radicand from the previous invocation. + return sqrt(nested[-1]), [0]*len(nested) + if not(sqrt_depth(vad) <= sqrt_depth(R) + 1 or + (vad**2).is_Number): + av0[1] = None + return None, None + + sqvad = _sqrtdenest1(sqrt(vad), denester=False) + if not (sqrt_depth(sqvad) <= sqrt_depth(R) + 1): + av0[1] = None + return None, None + sqvad1 = radsimp(1/sqvad) + res = _mexpand(sqvad/sqrt(2) + (v[1]*sqrt(R)*sqvad1/sqrt(2))) + return res, f + + # sign(v[1])*sqrt(_mexpand(v[1]**2*R*vad1/2))), f + else: # Solution requires a fourth root + s2 = _mexpand(v[1]*R) + d + if s2 <= 0: + return sqrt(nested[-1]), [0]*len(nested) + FR, s = root(_mexpand(R), 4), sqrt(s2) + return _mexpand(s/(sqrt(2)*FR) + v[0]*FR/(sqrt(2)*s)), f + + +def _sqrt_ratcomb(cs, args): + """Denest rational combinations of radicals. + + Based on section 5 of [1]. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.simplify.sqrtdenest import sqrtdenest + >>> z = sqrt(1+sqrt(3)) + sqrt(3+3*sqrt(3)) - sqrt(10+6*sqrt(3)) + >>> sqrtdenest(z) + 0 + """ + from sympy.simplify.radsimp import radsimp + + # check if there exists a pair of sqrt that can be denested + def find(a): + n = len(a) + for i in range(n - 1): + for j in range(i + 1, n): + s1 = a[i].base + s2 = a[j].base + p = _mexpand(s1 * s2) + s = sqrtdenest(sqrt(p)) + if s != sqrt(p): + return s, i, j + + indices = find(args) + if indices is None: + return Add(*[c * arg for c, arg in zip(cs, args)]) + + s, i1, i2 = indices + + c2 = cs.pop(i2) + args.pop(i2) + a1 = args[i1] + + # replace a2 by s/a1 + cs[i1] += radsimp(c2 * s / a1.base) + + return _sqrt_ratcomb(cs, args) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_combsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_combsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..e56758a005fbb013c2b6ea4121b16c3434a54b03 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_combsimp.py @@ -0,0 +1,75 @@ +from sympy.core.numbers import Rational +from sympy.core.symbol import symbols +from sympy.functions.combinatorial.factorials import (FallingFactorial, RisingFactorial, binomial, factorial) +from sympy.functions.special.gamma_functions import gamma +from sympy.simplify.combsimp import combsimp +from sympy.abc import x + + +def test_combsimp(): + k, m, n = symbols('k m n', integer = True) + + assert combsimp(factorial(n)) == factorial(n) + assert combsimp(binomial(n, k)) == binomial(n, k) + + assert combsimp(factorial(n)/factorial(n - 3)) == n*(-1 + n)*(-2 + n) + assert combsimp(binomial(n + 1, k + 1)/binomial(n, k)) == (1 + n)/(1 + k) + + assert combsimp(binomial(3*n + 4, n + 1)/binomial(3*n + 1, n)) == \ + Rational(3, 2)*((3*n + 2)*(3*n + 4)/((n + 1)*(2*n + 3))) + + assert combsimp(factorial(n)**2/factorial(n - 3)) == \ + factorial(n)*n*(-1 + n)*(-2 + n) + assert combsimp(factorial(n)*binomial(n + 1, k + 1)/binomial(n, k)) == \ + factorial(n + 1)/(1 + k) + + assert combsimp(gamma(n + 3)) == factorial(n + 2) + + assert combsimp(factorial(x)) == gamma(x + 1) + + # issue 9699 + assert combsimp((n + 1)*factorial(n)) == factorial(n + 1) + assert combsimp(factorial(n)/n) == factorial(n-1) + + # issue 6658 + assert combsimp(binomial(n, n - k)) == binomial(n, k) + + # issue 6341, 7135 + assert combsimp(factorial(n)/(factorial(k)*factorial(n - k))) == \ + binomial(n, k) + assert combsimp(factorial(k)*factorial(n - k)/factorial(n)) == \ + 1/binomial(n, k) + assert combsimp(factorial(2*n)/factorial(n)**2) == binomial(2*n, n) + assert combsimp(factorial(2*n)*factorial(k)*factorial(n - k)/ + factorial(n)**3) == binomial(2*n, n)/binomial(n, k) + + assert combsimp(factorial(n*(1 + n) - n**2 - n)) == 1 + + assert combsimp(6*FallingFactorial(-4, n)/factorial(n)) == \ + (-1)**n*(n + 1)*(n + 2)*(n + 3) + assert combsimp(6*FallingFactorial(-4, n - 1)/factorial(n - 1)) == \ + (-1)**(n - 1)*n*(n + 1)*(n + 2) + assert combsimp(6*FallingFactorial(-4, n - 3)/factorial(n - 3)) == \ + (-1)**(n - 3)*n*(n - 1)*(n - 2) + assert combsimp(6*FallingFactorial(-4, -n - 1)/factorial(-n - 1)) == \ + -(-1)**(-n - 1)*n*(n - 1)*(n - 2) + + assert combsimp(6*RisingFactorial(4, n)/factorial(n)) == \ + (n + 1)*(n + 2)*(n + 3) + assert combsimp(6*RisingFactorial(4, n - 1)/factorial(n - 1)) == \ + n*(n + 1)*(n + 2) + assert combsimp(6*RisingFactorial(4, n - 3)/factorial(n - 3)) == \ + n*(n - 1)*(n - 2) + assert combsimp(6*RisingFactorial(4, -n - 1)/factorial(-n - 1)) == \ + -n*(n - 1)*(n - 2) + + +def test_issue_6878(): + n = symbols('n', integer=True) + assert combsimp(RisingFactorial(-10, n)) == 3628800*(-1)**n/factorial(10 - n) + + +def test_issue_14528(): + p = symbols("p", integer=True, positive=True) + assert combsimp(binomial(1,p)) == 1/(factorial(p)*factorial(1-p)) + assert combsimp(factorial(2-p)) == factorial(2-p) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse.py new file mode 100644 index 0000000000000000000000000000000000000000..c2a34dfb0e227547bd41bed2491284fd7150d0b6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse.py @@ -0,0 +1,761 @@ +from functools import reduce +import itertools +from operator import add + +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.expr import UnevaluatedExpr +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions import Inverse, MatAdd, MatMul, Transpose +from sympy.polys.rootoftools import CRootOf +from sympy.series.order import O +from sympy.simplify.cse_main import cse +from sympy.simplify.simplify import signsimp +from sympy.tensor.indexed import (Idx, IndexedBase) + +from sympy.core.function import count_ops +from sympy.simplify.cse_opts import sub_pre, sub_post +from sympy.functions.special.hyper import meijerg +from sympy.simplify import cse_main, cse_opts +from sympy.utilities.iterables import subsets +from sympy.testing.pytest import XFAIL, raises +from sympy.matrices import (MutableDenseMatrix, MutableSparseMatrix, + ImmutableDenseMatrix, ImmutableSparseMatrix) +from sympy.matrices.expressions import MatrixSymbol + + +w, x, y, z = symbols('w,x,y,z') +x0, x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12 = symbols('x:13') + + +def test_numbered_symbols(): + ns = cse_main.numbered_symbols(prefix='y') + assert list(itertools.islice( + ns, 0, 10)) == [Symbol('y%s' % i) for i in range(0, 10)] + ns = cse_main.numbered_symbols(prefix='y') + assert list(itertools.islice( + ns, 10, 20)) == [Symbol('y%s' % i) for i in range(10, 20)] + ns = cse_main.numbered_symbols() + assert list(itertools.islice( + ns, 0, 10)) == [Symbol('x%s' % i) for i in range(0, 10)] + +# Dummy "optimization" functions for testing. + + +def opt1(expr): + return expr + y + + +def opt2(expr): + return expr*z + + +def test_preprocess_for_cse(): + assert cse_main.preprocess_for_cse(x, [(opt1, None)]) == x + y + assert cse_main.preprocess_for_cse(x, [(None, opt1)]) == x + assert cse_main.preprocess_for_cse(x, [(None, None)]) == x + assert cse_main.preprocess_for_cse(x, [(opt1, opt2)]) == x + y + assert cse_main.preprocess_for_cse( + x, [(opt1, None), (opt2, None)]) == (x + y)*z + + +def test_postprocess_for_cse(): + assert cse_main.postprocess_for_cse(x, [(opt1, None)]) == x + assert cse_main.postprocess_for_cse(x, [(None, opt1)]) == x + y + assert cse_main.postprocess_for_cse(x, [(None, None)]) == x + assert cse_main.postprocess_for_cse(x, [(opt1, opt2)]) == x*z + # Note the reverse order of application. + assert cse_main.postprocess_for_cse( + x, [(None, opt1), (None, opt2)]) == x*z + y + + +def test_cse_single(): + # Simple substitution. + e = Add(Pow(x + y, 2), sqrt(x + y)) + substs, reduced = cse([e]) + assert substs == [(x0, x + y)] + assert reduced == [sqrt(x0) + x0**2] + + subst42, (red42,) = cse([42]) # issue_15082 + assert len(subst42) == 0 and red42 == 42 + subst_half, (red_half,) = cse([0.5]) + assert len(subst_half) == 0 and red_half == 0.5 + + +def test_cse_single2(): + # Simple substitution, test for being able to pass the expression directly + e = Add(Pow(x + y, 2), sqrt(x + y)) + substs, reduced = cse(e) + assert substs == [(x0, x + y)] + assert reduced == [sqrt(x0) + x0**2] + substs, reduced = cse(Matrix([[1]])) + assert isinstance(reduced[0], Matrix) + + subst42, (red42,) = cse(42) # issue 15082 + assert len(subst42) == 0 and red42 == 42 + subst_half, (red_half,) = cse(0.5) # issue 15082 + assert len(subst_half) == 0 and red_half == 0.5 + + +def test_cse_not_possible(): + # No substitution possible. + e = Add(x, y) + substs, reduced = cse([e]) + assert substs == [] + assert reduced == [x + y] + # issue 6329 + eq = (meijerg((1, 2), (y, 4), (5,), [], x) + + meijerg((1, 3), (y, 4), (5,), [], x)) + assert cse(eq) == ([], [eq]) + + +def test_nested_substitution(): + # Substitution within a substitution. + e = Add(Pow(w*x + y, 2), sqrt(w*x + y)) + substs, reduced = cse([e]) + assert substs == [(x0, w*x + y)] + assert reduced == [sqrt(x0) + x0**2] + + +def test_subtraction_opt(): + # Make sure subtraction is optimized. + e = (x - y)*(z - y) + exp((x - y)*(z - y)) + substs, reduced = cse( + [e], optimizations=[(cse_opts.sub_pre, cse_opts.sub_post)]) + assert substs == [(x0, (x - y)*(y - z))] + assert reduced == [-x0 + exp(-x0)] + e = -(x - y)*(z - y) + exp(-(x - y)*(z - y)) + substs, reduced = cse( + [e], optimizations=[(cse_opts.sub_pre, cse_opts.sub_post)]) + assert substs == [(x0, (x - y)*(y - z))] + assert reduced == [x0 + exp(x0)] + # issue 4077 + n = -1 + 1/x + e = n/x/(-n)**2 - 1/n/x + assert cse(e, optimizations=[(cse_opts.sub_pre, cse_opts.sub_post)]) == \ + ([], [0]) + assert cse(((w + x + y + z)*(w - y - z))/(w + x)**3) == \ + ([(x0, w + x), (x1, y + z)], [(w - x1)*(x0 + x1)/x0**3]) + + +def test_multiple_expressions(): + e1 = (x + y)*z + e2 = (x + y)*w + substs, reduced = cse([e1, e2]) + assert substs == [(x0, x + y)] + assert reduced == [x0*z, x0*w] + l = [w*x*y + z, w*y] + substs, reduced = cse(l) + rsubsts, _ = cse(reversed(l)) + assert substs == rsubsts + assert reduced == [z + x*x0, x0] + l = [w*x*y, w*x*y + z, w*y] + substs, reduced = cse(l) + rsubsts, _ = cse(reversed(l)) + assert substs == rsubsts + assert reduced == [x1, x1 + z, x0] + l = [(x - z)*(y - z), x - z, y - z] + substs, reduced = cse(l) + rsubsts, _ = cse(reversed(l)) + assert substs == [(x0, -z), (x1, x + x0), (x2, x0 + y)] + assert rsubsts == [(x0, -z), (x1, x0 + y), (x2, x + x0)] + assert reduced == [x1*x2, x1, x2] + l = [w*y + w + x + y + z, w*x*y] + assert cse(l) == ([(x0, w*y)], [w + x + x0 + y + z, x*x0]) + assert cse([x + y, x + y + z]) == ([(x0, x + y)], [x0, z + x0]) + assert cse([x + y, x + z]) == ([], [x + y, x + z]) + assert cse([x*y, z + x*y, x*y*z + 3]) == \ + ([(x0, x*y)], [x0, z + x0, 3 + x0*z]) + + +@XFAIL # CSE of non-commutative Mul terms is disabled +def test_non_commutative_cse(): + A, B, C = symbols('A B C', commutative=False) + l = [A*B*C, A*C] + assert cse(l) == ([], l) + l = [A*B*C, A*B] + assert cse(l) == ([(x0, A*B)], [x0*C, x0]) + + +# Test if CSE of non-commutative Mul terms is disabled +def test_bypass_non_commutatives(): + A, B, C = symbols('A B C', commutative=False) + l = [A*B*C, A*C] + assert cse(l) == ([], l) + l = [A*B*C, A*B] + assert cse(l) == ([], l) + l = [B*C, A*B*C] + assert cse(l) == ([], l) + + +@XFAIL # CSE fails when replacing non-commutative sub-expressions +def test_non_commutative_order(): + A, B, C = symbols('A B C', commutative=False) + x0 = symbols('x0', commutative=False) + l = [B+C, A*(B+C)] + assert cse(l) == ([(x0, B+C)], [x0, A*x0]) + + +@XFAIL # Worked in gh-11232, but was reverted due to performance considerations +def test_issue_10228(): + assert cse([x*y**2 + x*y]) == ([(x0, x*y)], [x0*y + x0]) + assert cse([x + y, 2*x + y]) == ([(x0, x + y)], [x0, x + x0]) + assert cse((w + 2*x + y + z, w + x + 1)) == ( + [(x0, w + x)], [x0 + x + y + z, x0 + 1]) + assert cse(((w + x + y + z)*(w - x))/(w + x)) == ( + [(x0, w + x)], [(x0 + y + z)*(w - x)/x0]) + a, b, c, d, f, g, j, m = symbols('a, b, c, d, f, g, j, m') + exprs = (d*g**2*j*m, 4*a*f*g*m, a*b*c*f**2) + assert cse(exprs) == ( + [(x0, g*m), (x1, a*f)], [d*g*j*x0, 4*x0*x1, b*c*f*x1] +) + +@XFAIL +def test_powers(): + assert cse(x*y**2 + x*y) == ([(x0, x*y)], [x0*y + x0]) + + +def test_issue_4498(): + assert cse(w/(x - y) + z/(y - x), optimizations='basic') == \ + ([], [(w - z)/(x - y)]) + + +def test_issue_4020(): + assert cse(x**5 + x**4 + x**3 + x**2, optimizations='basic') \ + == ([(x0, x**2)], [x0*(x**3 + x + x0 + 1)]) + + +def test_issue_4203(): + assert cse(sin(x**x)/x**x) == ([(x0, x**x)], [sin(x0)/x0]) + + +def test_issue_6263(): + e = Eq(x*(-x + 1) + x*(x - 1), 0) + assert cse(e, optimizations='basic') == ([], [True]) + + +def test_issue_25043(): + c = symbols("c") + x = symbols("x0", real=True) + cse_expr = cse(c*x**2 + c*(x**4 - x**2))[-1][-1] + free = cse_expr.free_symbols + assert len(free) == len({i.name for i in free}) + + +def test_dont_cse_tuples(): + from sympy.core.function import Subs + f = Function("f") + g = Function("g") + + name_val, (expr,) = cse( + Subs(f(x, y), (x, y), (0, 1)) + + Subs(g(x, y), (x, y), (0, 1))) + + assert name_val == [] + assert expr == (Subs(f(x, y), (x, y), (0, 1)) + + Subs(g(x, y), (x, y), (0, 1))) + + name_val, (expr,) = cse( + Subs(f(x, y), (x, y), (0, x + y)) + + Subs(g(x, y), (x, y), (0, x + y))) + + assert name_val == [(x0, x + y)] + assert expr == Subs(f(x, y), (x, y), (0, x0)) + \ + Subs(g(x, y), (x, y), (0, x0)) + + +def test_pow_invpow(): + assert cse(1/x**2 + x**2) == \ + ([(x0, x**2)], [x0 + 1/x0]) + assert cse(x**2 + (1 + 1/x**2)/x**2) == \ + ([(x0, x**2), (x1, 1/x0)], [x0 + x1*(x1 + 1)]) + assert cse(1/x**2 + (1 + 1/x**2)*x**2) == \ + ([(x0, x**2), (x1, 1/x0)], [x0*(x1 + 1) + x1]) + assert cse(cos(1/x**2) + sin(1/x**2)) == \ + ([(x0, x**(-2))], [sin(x0) + cos(x0)]) + assert cse(cos(x**2) + sin(x**2)) == \ + ([(x0, x**2)], [sin(x0) + cos(x0)]) + assert cse(y/(2 + x**2) + z/x**2/y) == \ + ([(x0, x**2)], [y/(x0 + 2) + z/(x0*y)]) + assert cse(exp(x**2) + x**2*cos(1/x**2)) == \ + ([(x0, x**2)], [x0*cos(1/x0) + exp(x0)]) + assert cse((1 + 1/x**2)/x**2) == \ + ([(x0, x**(-2))], [x0*(x0 + 1)]) + assert cse(x**(2*y) + x**(-2*y)) == \ + ([(x0, x**(2*y))], [x0 + 1/x0]) + + +def test_postprocess(): + eq = (x + 1 + exp((x + 1)/(y + 1)) + cos(y + 1)) + assert cse([eq, Eq(x, z + 1), z - 2, (z + 1)*(x + 1)], + postprocess=cse_main.cse_separate) == \ + [[(x0, y + 1), (x2, z + 1), (x, x2), (x1, x + 1)], + [x1 + exp(x1/x0) + cos(x0), z - 2, x1*x2]] + + +def test_issue_4499(): + # previously, this gave 16 constants + from sympy.abc import a, b + B = Function('B') + G = Function('G') + t = Tuple(* + (a, a + S.Half, 2*a, b, 2*a - b + 1, (sqrt(z)/2)**(-2*a + 1)*B(2*a - + b, sqrt(z))*B(b - 1, sqrt(z))*G(b)*G(2*a - b + 1), + sqrt(z)*(sqrt(z)/2)**(-2*a + 1)*B(b, sqrt(z))*B(2*a - b, + sqrt(z))*G(b)*G(2*a - b + 1), sqrt(z)*(sqrt(z)/2)**(-2*a + 1)*B(b - 1, + sqrt(z))*B(2*a - b + 1, sqrt(z))*G(b)*G(2*a - b + 1), + (sqrt(z)/2)**(-2*a + 1)*B(b, sqrt(z))*B(2*a - b + 1, + sqrt(z))*G(b)*G(2*a - b + 1), 1, 0, S.Half, z/2, -b + 1, -2*a + b, + -2*a)) + c = cse(t) + ans = ( + [(x0, 2*a), (x1, -b + x0), (x2, x1 + 1), (x3, b - 1), (x4, sqrt(z)), + (x5, B(x3, x4)), (x6, (x4/2)**(1 - x0)*G(b)*G(x2)), (x7, x6*B(x1, x4)), + (x8, B(b, x4)), (x9, x6*B(x2, x4))], + [(a, a + S.Half, x0, b, x2, x5*x7, x4*x7*x8, x4*x5*x9, x8*x9, + 1, 0, S.Half, z/2, -x3, -x1, -x0)]) + assert ans == c + + +def test_issue_6169(): + r = CRootOf(x**6 - 4*x**5 - 2, 1) + assert cse(r) == ([], [r]) + # and a check that the right thing is done with the new + # mechanism + assert sub_post(sub_pre((-x - y)*z - x - y)) == -z*(x + y) - x - y + + +def test_cse_Indexed(): + len_y = 5 + y = IndexedBase('y', shape=(len_y,)) + x = IndexedBase('x', shape=(len_y,)) + i = Idx('i', len_y-1) + + expr1 = (y[i+1]-y[i])/(x[i+1]-x[i]) + expr2 = 1/(x[i+1]-x[i]) + replacements, reduced_exprs = cse([expr1, expr2]) + assert len(replacements) > 0 + + +def test_cse_MatrixSymbol(): + # MatrixSymbols have non-Basic args, so make sure that works + A = MatrixSymbol("A", 3, 3) + assert cse(A) == ([], [A]) + + n = symbols('n', integer=True) + B = MatrixSymbol("B", n, n) + assert cse(B) == ([], [B]) + + assert cse(A[0] * A[0]) == ([], [A[0]*A[0]]) + + assert cse(A[0,0]*A[0,1] + A[0,0]*A[0,1]*A[0,2]) == ([(x0, A[0, 0]*A[0, 1])], [x0*A[0, 2] + x0]) + +def test_cse_MatrixExpr(): + A = MatrixSymbol('A', 3, 3) + y = MatrixSymbol('y', 3, 1) + + expr1 = (A.T*A).I * A * y + expr2 = (A.T*A) * A * y + replacements, reduced_exprs = cse([expr1, expr2]) + assert len(replacements) > 0 + + replacements, reduced_exprs = cse([expr1 + expr2, expr1]) + assert replacements + + replacements, reduced_exprs = cse([A**2, A + A**2]) + assert replacements + + +def test_Piecewise(): + f = Piecewise((-z + x*y, Eq(y, 0)), (-z - x*y, True)) + ans = cse(f) + actual_ans = ([(x0, x*y)], + [Piecewise((x0 - z, Eq(y, 0)), (-z - x0, True))]) + assert ans == actual_ans + + +def test_ignore_order_terms(): + eq = exp(x).series(x,0,3) + sin(y+x**3) - 1 + assert cse(eq) == ([], [sin(x**3 + y) + x + x**2/2 + O(x**3)]) + + +def test_name_conflict(): + z1 = x0 + y + z2 = x2 + x3 + l = [cos(z1) + z1, cos(z2) + z2, x0 + x2] + substs, reduced = cse(l) + assert [e.subs(reversed(substs)) for e in reduced] == l + + +def test_name_conflict_cust_symbols(): + z1 = x0 + y + z2 = x2 + x3 + l = [cos(z1) + z1, cos(z2) + z2, x0 + x2] + substs, reduced = cse(l, symbols("x:10")) + assert [e.subs(reversed(substs)) for e in reduced] == l + + +def test_symbols_exhausted_error(): + l = cos(x+y)+x+y+cos(w+y)+sin(w+y) + sym = [x, y, z] + with raises(ValueError): + cse(l, symbols=sym) + + +def test_issue_7840(): + # daveknippers' example + C393 = sympify( \ + 'Piecewise((C391 - 1.65, C390 < 0.5), (Piecewise((C391 - 1.65, \ + C391 > 2.35), (C392, True)), True))' + ) + C391 = sympify( \ + 'Piecewise((2.05*C390**(-1.03), C390 < 0.5), (2.5*C390**(-0.625), True))' + ) + C393 = C393.subs('C391',C391) + # simple substitution + sub = {} + sub['C390'] = 0.703451854 + sub['C392'] = 1.01417794 + ss_answer = C393.subs(sub) + # cse + substitutions,new_eqn = cse(C393) + for pair in substitutions: + sub[pair[0].name] = pair[1].subs(sub) + cse_answer = new_eqn[0].subs(sub) + # both methods should be the same + assert ss_answer == cse_answer + + # GitRay's example + expr = sympify( + "Piecewise((Symbol('ON'), Equality(Symbol('mode'), Symbol('ON'))), \ + (Piecewise((Piecewise((Symbol('OFF'), StrictLessThan(Symbol('x'), \ + Symbol('threshold'))), (Symbol('ON'), true)), Equality(Symbol('mode'), \ + Symbol('AUTO'))), (Symbol('OFF'), true)), true))" + ) + substitutions, new_eqn = cse(expr) + # this Piecewise should be exactly the same + assert new_eqn[0] == expr + # there should not be any replacements + assert len(substitutions) < 1 + + +def test_issue_8891(): + for cls in (MutableDenseMatrix, MutableSparseMatrix, + ImmutableDenseMatrix, ImmutableSparseMatrix): + m = cls(2, 2, [x + y, 0, 0, 0]) + res = cse([x + y, m]) + ans = ([(x0, x + y)], [x0, cls([[x0, 0], [0, 0]])]) + assert res == ans + assert isinstance(res[1][-1], cls) + + +def test_issue_11230(): + # a specific test that always failed + a, b, f, k, l, i = symbols('a b f k l i') + p = [a*b*f*k*l, a*i*k**2*l, f*i*k**2*l] + R, C = cse(p) + assert not any(i.is_Mul for a in C for i in a.args) + + # random tests for the issue + from sympy.core.random import choice + from sympy.core.function import expand_mul + s = symbols('a:m') + # 35 Mul tests, none of which should ever fail + ex = [Mul(*[choice(s) for i in range(5)]) for i in range(7)] + for p in subsets(ex, 3): + p = list(p) + R, C = cse(p) + assert not any(i.is_Mul for a in C for i in a.args) + for ri in reversed(R): + for i in range(len(C)): + C[i] = C[i].subs(*ri) + assert p == C + # 35 Add tests, none of which should ever fail + ex = [Add(*[choice(s[:7]) for i in range(5)]) for i in range(7)] + for p in subsets(ex, 3): + p = list(p) + R, C = cse(p) + assert not any(i.is_Add for a in C for i in a.args) + for ri in reversed(R): + for i in range(len(C)): + C[i] = C[i].subs(*ri) + # use expand_mul to handle cases like this: + # p = [a + 2*b + 2*e, 2*b + c + 2*e, b + 2*c + 2*g] + # x0 = 2*(b + e) is identified giving a rebuilt p that + # is now `[a + 2*(b + e), c + 2*(b + e), b + 2*c + 2*g]` + assert p == [expand_mul(i) for i in C] + + +@XFAIL +def test_issue_11577(): + def check(eq): + r, c = cse(eq) + assert eq.count_ops() >= \ + len(r) + sum(i[1].count_ops() for i in r) + \ + count_ops(c) + + eq = x**5*y**2 + x**5*y + x**5 + assert cse(eq) == ( + [(x0, x**4), (x1, x*y)], [x**5 + x0*x1*y + x0*x1]) + # ([(x0, x**5*y)], [x0*y + x0 + x**5]) or + # ([(x0, x**5)], [x0*y**2 + x0*y + x0]) + check(eq) + + eq = x**2/(y + 1)**2 + x/(y + 1) + assert cse(eq) == ( + [(x0, y + 1)], [x**2/x0**2 + x/x0]) + # ([(x0, x/(y + 1))], [x0**2 + x0]) + check(eq) + + +def test_hollow_rejection(): + eq = [x + 3, x + 4] + assert cse(eq) == ([], eq) + + +def test_cse_ignore(): + exprs = [exp(y)*(3*y + 3*sqrt(x+1)), exp(y)*(5*y + 5*sqrt(x+1))] + subst1, red1 = cse(exprs) + assert any(y in sub.free_symbols for _, sub in subst1), "cse failed to identify any term with y" + + subst2, red2 = cse(exprs, ignore=(y,)) # y is not allowed in substitutions + assert not any(y in sub.free_symbols for _, sub in subst2), "Sub-expressions containing y must be ignored" + assert any(sub - sqrt(x + 1) == 0 for _, sub in subst2), "cse failed to identify sqrt(x + 1) as sub-expression" + + +def test_cse_ignore_issue_15002(): + l = [ + w*exp(x)*exp(-z), + exp(y)*exp(x)*exp(-z) + ] + substs, reduced = cse(l, ignore=(x,)) + rl = [e.subs(reversed(substs)) for e in reduced] + assert rl == l + + +def test_cse_unevaluated(): + xp1 = UnevaluatedExpr(x + 1) + # This used to cause RecursionError + [(x0, ue)], [red] = cse([(-1 - xp1) / (1 - xp1)]) + if ue == xp1: + assert red == (-1 - x0) / (1 - x0) + elif ue == -xp1: + assert red == (-1 + x0) / (1 + x0) + else: + msg = f'Expected common subexpression {xp1} or {-xp1}, instead got {ue}' + assert False, msg + + +def test_cse__performance(): + nexprs, nterms = 3, 20 + x = symbols('x:%d' % nterms) + exprs = [ + reduce(add, [x[j]*(-1)**(i+j) for j in range(nterms)]) + for i in range(nexprs) + ] + assert (exprs[0] + exprs[1]).simplify() == 0 + subst, red = cse(exprs) + assert len(subst) > 0, "exprs[0] == -exprs[2], i.e. a CSE" + for i, e in enumerate(red): + assert (e.subs(reversed(subst)) - exprs[i]).simplify() == 0 + + +def test_issue_12070(): + exprs = [x + y, 2 + x + y, x + y + z, 3 + x + y + z] + subst, red = cse(exprs) + assert 6 >= (len(subst) + sum(v.count_ops() for k, v in subst) + + count_ops(red)) + + +def test_issue_13000(): + eq = x/(-4*x**2 + y**2) + cse_eq = cse(eq)[1][0] + assert cse_eq == eq + + +def test_issue_18203(): + eq = CRootOf(x**5 + 11*x - 2, 0) + CRootOf(x**5 + 11*x - 2, 1) + assert cse(eq) == ([], [eq]) + + +def test_unevaluated_mul(): + eq = Mul(x + y, x + y, evaluate=False) + assert cse(eq) == ([(x0, x + y)], [x0**2]) + + +def test_cse_release_variables(): + from sympy.simplify.cse_main import cse_release_variables + _0, _1, _2, _3, _4 = symbols('_:5') + eqs = [(x + y - 1)**2, x, + x + y, (x + y)/(2*x + 1) + (x + y - 1)**2, + (2*x + 1)**(x + y)] + r, e = cse(eqs, postprocess=cse_release_variables) + # this can change in keeping with the intention of the function + assert r, e == ([ + (x0, x + y), (x1, (x0 - 1)**2), (x2, 2*x + 1), + (_3, x0/x2 + x1), (_4, x2**x0), (x2, None), (_0, x1), + (x1, None), (_2, x0), (x0, None), (_1, x)], (_0, _1, _2, _3, _4)) + r.reverse() + r = [(s, v) for s, v in r if v is not None] + assert eqs == [i.subs(r) for i in e] + + +def test_cse_list(): + _cse = lambda x: cse(x, list=False) + assert _cse(x) == ([], x) + assert _cse('x') == ([], 'x') + it = [x] + for c in (list, tuple, set): + assert _cse(c(it)) == ([], c(it)) + #Tuple works different from tuple: + assert _cse(Tuple(*it)) == ([], Tuple(*it)) + d = {x: 1} + assert _cse(d) == ([], d) + +def test_issue_18991(): + A = MatrixSymbol('A', 2, 2) + assert signsimp(-A * A - A) == -A * A - A + + +def test_unevaluated_Mul(): + m = [Mul(1, 2, evaluate=False)] + assert cse(m) == ([], m) + + +def test_cse_matrix_expression_inverse(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = Inverse(A) + cse_expr = cse(x) + assert cse_expr == ([], [Inverse(A)]) + + +def test_cse_matrix_expression_matmul_inverse(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + b = ImmutableDenseMatrix(symbols('b:2')) + x = MatMul(Inverse(A), b) + cse_expr = cse(x) + assert cse_expr == ([], [x]) + + +def test_cse_matrix_negate_matrix(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = MatMul(S.NegativeOne, A) + cse_expr = cse(x) + assert cse_expr == ([], [x]) + + +def test_cse_matrix_negate_matmul_not_extracted(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + B = ImmutableDenseMatrix(symbols('B:4')).reshape(2, 2) + x = MatMul(S.NegativeOne, A, B) + cse_expr = cse(x) + assert cse_expr == ([], [x]) + + +@XFAIL # No simplification rule for nested associative operations +def test_cse_matrix_nested_matmul_collapsed(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + B = ImmutableDenseMatrix(symbols('B:4')).reshape(2, 2) + x = MatMul(S.NegativeOne, MatMul(A, B)) + cse_expr = cse(x) + assert cse_expr == ([], [MatMul(S.NegativeOne, A, B)]) + + +def test_cse_matrix_optimize_out_single_argument_mul(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = MatMul(MatMul(MatMul(A))) + cse_expr = cse(x) + assert cse_expr == ([], [A]) + + +@XFAIL # Multiple simplification passed not supported in CSE +def test_cse_matrix_optimize_out_single_argument_mul_combined(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = MatAdd(MatMul(MatMul(MatMul(A))), MatMul(MatMul(A)), MatMul(A), A) + cse_expr = cse(x) + assert cse_expr == ([], [MatMul(4, A)]) + + +def test_cse_matrix_optimize_out_single_argument_add(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = MatAdd(MatAdd(MatAdd(MatAdd(A)))) + cse_expr = cse(x) + assert cse_expr == ([], [A]) + + +@XFAIL # Multiple simplification passed not supported in CSE +def test_cse_matrix_optimize_out_single_argument_add_combined(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + x = MatMul(MatAdd(MatAdd(MatAdd(A))), MatAdd(MatAdd(A)), MatAdd(A), A) + cse_expr = cse(x) + assert cse_expr == ([], [MatMul(4, A)]) + + +def test_cse_matrix_expression_matrix_solve(): + A = ImmutableDenseMatrix(symbols('A:4')).reshape(2, 2) + b = ImmutableDenseMatrix(symbols('b:2')) + x = MatrixSolve(A, b) + cse_expr = cse(x) + assert cse_expr == ([], [x]) + + +def test_cse_matrix_matrix_expression(): + X = ImmutableDenseMatrix(symbols('X:4')).reshape(2, 2) + y = ImmutableDenseMatrix(symbols('y:2')) + b = MatMul(Inverse(MatMul(Transpose(X), X)), Transpose(X), y) + cse_expr = cse(b) + x0 = MatrixSymbol('x0', 2, 2) + reduced_expr_expected = MatMul(Inverse(MatMul(x0, X)), x0, y) + assert cse_expr == ([(x0, Transpose(X))], [reduced_expr_expected]) + + +def test_cse_matrix_kalman_filter(): + """Kalman Filter example from Matthew Rocklin's SciPy 2013 talk. + + Talk titled: "Matrix Expressions and BLAS/LAPACK; SciPy 2013 Presentation" + + Video: https://pyvideo.org/scipy-2013/matrix-expressions-and-blaslapack-scipy-2013-pr.html + + Notes + ===== + + Equations are: + + new_mu = mu + Sigma*H.T * (R + H*Sigma*H.T).I * (H*mu - data) + = MatAdd(mu, MatMul(Sigma, Transpose(H), Inverse(MatAdd(R, MatMul(H, Sigma, Transpose(H)))), MatAdd(MatMul(H, mu), MatMul(S.NegativeOne, data)))) + new_Sigma = Sigma - Sigma*H.T * (R + H*Sigma*H.T).I * H * Sigma + = MatAdd(Sigma, MatMul(S.NegativeOne, Sigma, Transpose(H)), Inverse(MatAdd(R, MatMul(H*Sigma*Transpose(H)))), H, Sigma)) + + """ + N = 2 + mu = ImmutableDenseMatrix(symbols(f'mu:{N}')) + Sigma = ImmutableDenseMatrix(symbols(f'Sigma:{N * N}')).reshape(N, N) + H = ImmutableDenseMatrix(symbols(f'H:{N * N}')).reshape(N, N) + R = ImmutableDenseMatrix(symbols(f'R:{N * N}')).reshape(N, N) + data = ImmutableDenseMatrix(symbols(f'data:{N}')) + new_mu = MatAdd(mu, MatMul(Sigma, Transpose(H), Inverse(MatAdd(R, MatMul(H, Sigma, Transpose(H)))), MatAdd(MatMul(H, mu), MatMul(S.NegativeOne, data)))) + new_Sigma = MatAdd(Sigma, MatMul(S.NegativeOne, Sigma, Transpose(H), Inverse(MatAdd(R, MatMul(H, Sigma, Transpose(H)))), H, Sigma)) + cse_expr = cse([new_mu, new_Sigma]) + x0 = MatrixSymbol('x0', N, N) + x1 = MatrixSymbol('x1', N, N) + replacements_expected = [ + (x0, Transpose(H)), + (x1, Inverse(MatAdd(R, MatMul(H, Sigma, x0)))), + ] + reduced_exprs_expected = [ + MatAdd(mu, MatMul(Sigma, x0, x1, MatAdd(MatMul(H, mu), MatMul(S.NegativeOne, data)))), + MatAdd(Sigma, MatMul(S.NegativeOne, Sigma, x0, x1, H, Sigma)), + ] + assert cse_expr == (replacements_expected, reduced_exprs_expected) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse_diff.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse_diff.py new file mode 100644 index 0000000000000000000000000000000000000000..92b2d3d6bbaafb838a5e75f32a214511a1d39567 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_cse_diff.py @@ -0,0 +1,206 @@ +"""Tests for the ``sympy.simplify._cse_diff.py`` module.""" + +import pytest + +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.numbers import Integer +from sympy.core.function import Function +from sympy.core import Derivative +from sympy.functions.elementary.exponential import exp +from sympy.matrices.immutable import ImmutableDenseMatrix +from sympy.physics.mechanics import dynamicsymbols +from sympy.simplify._cse_diff import (_forward_jacobian, + _remove_cse_from_derivative, + _forward_jacobian_cse, + _forward_jacobian_norm_in_cse_out) +from sympy.simplify.simplify import simplify +from sympy.matrices import Matrix, eye + +from sympy.testing.pytest import raises +from sympy.functions.elementary.trigonometric import (cos, sin, tan) +from sympy.simplify.trigsimp import trigsimp + +from sympy import cse + + +w = Symbol('w') +x = Symbol('x') +y = Symbol('y') +z = Symbol('z') + +q1, q2, q3 = dynamicsymbols('q1 q2 q3') + +# Define the custom functions +k = Function('k')(x, y) +f = Function('f')(k, z) + +zero = Integer(0) +one = Integer(1) +two = Integer(2) +neg_one = Integer(-1) + + +@pytest.mark.parametrize( + 'expr, wrt', + [ + ([zero], [x]), + ([one], [x]), + ([two], [x]), + ([neg_one], [x]), + ([x], [x]), + ([y], [x]), + ([x + y], [x]), + ([x*y], [x]), + ([x**2], [x]), + ([x**y], [x]), + ([exp(x)], [x]), + ([sin(x)], [x]), + ([tan(x)], [x]), + ([zero, one, x, y, x*y, x + y], [x, y]), + ([((x/y) + sin(x/y) - exp(y))*((x/y) - exp(y))], [x, y]), + ([w*tan(y*z)/(x - tan(y*z)), w*x*tan(y*z)/(x - tan(y*z))], [w, x, y, z]), + ([q1**2 + q2, q2**2 + q3, q3**2 + q1], [q1, q2, q3]), + ([f + Derivative(f, x) + k + 2*x], [x]) + ] +) + + +def test_forward_jacobian(expr, wrt): + expr = ImmutableDenseMatrix([expr]).T + wrt = ImmutableDenseMatrix([wrt]).T + jacobian = _forward_jacobian(expr, wrt) + zeros = ImmutableDenseMatrix.zeros(*jacobian.shape) + assert simplify(jacobian - expr.jacobian(wrt)) == zeros + + +def test_process_cse(): + x, y, z = symbols('x y z') + f = Function('f') + k = Function('k') + expr = Matrix([f(k(x,y), z) + Derivative(f(k(x,y), z), x) + k(x,y) + 2*x]) + repl, reduced = cse(expr) + p_repl, p_reduced = _remove_cse_from_derivative(repl, reduced) + + x0 = symbols('x0') + x1 = symbols('x1') + + expected_output = ( + [(x0, k(x, y)), (x1, f(x0, z))], + [Matrix([2 * x + x0 + x1 + Derivative(f(k(x, y), z), x)])] + ) + + assert p_repl == expected_output[0], f"Expected {expected_output[0]}, but got {p_repl}" + assert p_reduced == expected_output[1], f"Expected {expected_output[1]}, but got {p_reduced}" + + +def test_io_matrix_type(): + x, y, z = symbols('x y z') + expr = ImmutableDenseMatrix([ + x * y + y * z + x * y * z, + x ** 2 + y ** 2 + z ** 2, + x * y + x * z + y * z + ]) + wrt = ImmutableDenseMatrix([x, y, z]) + + replacements, reduced_expr = cse(expr) + + # Test _forward_jacobian_core + replacements_core, jacobian_core, precomputed_fs_core = _forward_jacobian_cse(replacements, reduced_expr, wrt) + assert isinstance(jacobian_core[0], type(reduced_expr[0])), "Jacobian should be a Matrix of the same type as the input" + + # Test _forward_jacobian_norm_in_dag_out + replacements_norm, jacobian_norm, precomputed_fs_norm = _forward_jacobian_norm_in_cse_out( + expr, wrt) + assert isinstance(jacobian_norm[0], type(reduced_expr[0])), "Jacobian should be a Matrix of the same type as the input" + + # Test _forward_jacobian + jacobian = _forward_jacobian(expr, wrt) + assert isinstance(jacobian, type(expr)), "Jacobian should be a Matrix of the same type as the input" + + +def test_forward_jacobian_input_output(): + x, y, z = symbols('x y z') + expr = Matrix([ + x * y + y * z + x * y * z, + x ** 2 + y ** 2 + z ** 2, + x * y + x * z + y * z + ]) + wrt = Matrix([x, y, z]) + + replacements, reduced_expr = cse(expr) + + # Test _forward_jacobian_core + replacements_core, jacobian_core, precomputed_fs_core = _forward_jacobian_cse(replacements, reduced_expr, wrt) + assert isinstance(replacements_core, type(replacements)), "Replacements should be a list" + assert isinstance(jacobian_core, type(reduced_expr)), "Jacobian should be a list" + assert isinstance(precomputed_fs_core, list), "Precomputed free symbols should be a list" + assert len(replacements_core) == len(replacements), "Length of replacements does not match" + assert len(jacobian_core) == 1, "Jacobian should have one element" + assert len(precomputed_fs_core) == len(replacements), "Length of precomputed free symbols does not match" + + # Test _forward_jacobian_norm_in_dag_out + replacements_norm, jacobian_norm, precomputed_fs_norm = _forward_jacobian_norm_in_cse_out(expr, wrt) + assert isinstance(replacements_norm, type(replacements)), "Replacements should be a list" + assert isinstance(jacobian_norm, type(reduced_expr)), "Jacobian should be a list" + assert isinstance(precomputed_fs_norm, list), "Precomputed free symbols should be a list" + assert len(replacements_norm) == len(replacements), "Length of replacements does not match" + assert len(jacobian_norm) == 1, "Jacobian should have one element" + assert len(precomputed_fs_norm) == len(replacements), "Length of precomputed free symbols does not match" + + +def test_jacobian_hessian(): + L = Matrix(1, 2, [x**2*y, 2*y**2 + x*y]) + syms = [x, y] + assert _forward_jacobian(L, syms) == Matrix([[2*x*y, x**2], [y, 4*y + x]]) + + L = Matrix(1, 2, [x, x**2*y**3]) + assert _forward_jacobian(L, syms) == Matrix([[1, 0], [2*x*y**3, x**2*3*y**2]]) + + +def test_jacobian_metrics(): + rho, phi = symbols("rho,phi") + X = Matrix([rho * cos(phi), rho * sin(phi)]) + Y = Matrix([rho, phi]) + J = _forward_jacobian(X, Y) + assert J == X.jacobian(Y.T) + assert J == (X.T).jacobian(Y) + assert J == (X.T).jacobian(Y.T) + g = J.T * eye(J.shape[0]) * J + g = g.applyfunc(trigsimp) + assert g == Matrix([[1, 0], [0, rho ** 2]]) + + +def test_jacobian2(): + rho, phi = symbols("rho,phi") + X = Matrix([rho * cos(phi), rho * sin(phi), rho ** 2]) + Y = Matrix([rho, phi]) + J = Matrix([ + [cos(phi), -rho * sin(phi)], + [sin(phi), rho * cos(phi)], + [2 * rho, 0], + ]) + assert _forward_jacobian(X, Y) == J + + +def test_issue_4564(): + X = Matrix([exp(x + y + z), exp(x + y + z), exp(x + y + z)]) + Y = Matrix([x, y, z]) + for i in range(1, 3): + for j in range(1, 3): + X_slice = X[:i, :] + Y_slice = Y[:j, :] + J = _forward_jacobian(X_slice, Y_slice) + assert J.rows == i + assert J.cols == j + for k in range(j): + assert J[:, k] == X_slice + + +def test_nonvectorJacobian(): + X = Matrix([[exp(x + y + z), exp(x + y + z)], + [exp(x + y + z), exp(x + y + z)]]) + raises(TypeError, lambda: _forward_jacobian(X, Matrix([x, y, z]))) + X = X[0, :] + Y = Matrix([[x, y], [x, z]]) + raises(TypeError, lambda: _forward_jacobian(X, Y)) + raises(TypeError, lambda: _forward_jacobian(X, Matrix([[x, y], [x, z]]))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_epathtools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_epathtools.py new file mode 100644 index 0000000000000000000000000000000000000000..a8bb47b2f2ff624077ab9905677b181c587ab5a7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_epathtools.py @@ -0,0 +1,90 @@ +"""Tests for tools for manipulation of expressions using paths. """ + +from sympy.simplify.epathtools import epath, EPath +from sympy.testing.pytest import raises + +from sympy.core.numbers import E +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.abc import x, y, z, t + + +def test_epath_select(): + expr = [((x, 1, t), 2), ((3, y, 4), z)] + + assert epath("/*", expr) == [((x, 1, t), 2), ((3, y, 4), z)] + assert epath("/*/*", expr) == [(x, 1, t), 2, (3, y, 4), z] + assert epath("/*/*/*", expr) == [x, 1, t, 3, y, 4] + assert epath("/*/*/*/*", expr) == [] + + assert epath("/[:]", expr) == [((x, 1, t), 2), ((3, y, 4), z)] + assert epath("/[:]/[:]", expr) == [(x, 1, t), 2, (3, y, 4), z] + assert epath("/[:]/[:]/[:]", expr) == [x, 1, t, 3, y, 4] + assert epath("/[:]/[:]/[:]/[:]", expr) == [] + + assert epath("/*/[:]", expr) == [(x, 1, t), 2, (3, y, 4), z] + + assert epath("/*/[0]", expr) == [(x, 1, t), (3, y, 4)] + assert epath("/*/[1]", expr) == [2, z] + assert epath("/*/[2]", expr) == [] + + assert epath("/*/int", expr) == [2] + assert epath("/*/Symbol", expr) == [z] + assert epath("/*/tuple", expr) == [(x, 1, t), (3, y, 4)] + assert epath("/*/__iter__?", expr) == [(x, 1, t), (3, y, 4)] + + assert epath("/*/int|tuple", expr) == [(x, 1, t), 2, (3, y, 4)] + assert epath("/*/Symbol|tuple", expr) == [(x, 1, t), (3, y, 4), z] + assert epath("/*/int|Symbol|tuple", expr) == [(x, 1, t), 2, (3, y, 4), z] + + assert epath("/*/int|__iter__?", expr) == [(x, 1, t), 2, (3, y, 4)] + assert epath("/*/Symbol|__iter__?", expr) == [(x, 1, t), (3, y, 4), z] + assert epath( + "/*/int|Symbol|__iter__?", expr) == [(x, 1, t), 2, (3, y, 4), z] + + assert epath("/*/[0]/int", expr) == [1, 3, 4] + assert epath("/*/[0]/Symbol", expr) == [x, t, y] + + assert epath("/*/[0]/int[1:]", expr) == [1, 4] + assert epath("/*/[0]/Symbol[1:]", expr) == [t, y] + + assert epath("/Symbol", x + y + z + 1) == [x, y, z] + assert epath("/*/*/Symbol", t + sin(x + 1) + cos(x + y + E)) == [x, x, y] + + +def test_epath_apply(): + expr = [((x, 1, t), 2), ((3, y, 4), z)] + func = lambda expr: expr**2 + + assert epath("/*", expr, list) == [[(x, 1, t), 2], [(3, y, 4), z]] + + assert epath("/*/[0]", expr, list) == [([x, 1, t], 2), ([3, y, 4], z)] + assert epath("/*/[1]", expr, func) == [((x, 1, t), 4), ((3, y, 4), z**2)] + assert epath("/*/[2]", expr, list) == expr + + assert epath("/*/[0]/int", expr, func) == [((x, 1, t), 2), ((9, y, 16), z)] + assert epath("/*/[0]/Symbol", expr, func) == [((x**2, 1, t**2), 2), + ((3, y**2, 4), z)] + assert epath( + "/*/[0]/int[1:]", expr, func) == [((x, 1, t), 2), ((3, y, 16), z)] + assert epath("/*/[0]/Symbol[1:]", expr, func) == [((x, 1, t**2), + 2), ((3, y**2, 4), z)] + + assert epath("/Symbol", x + y + z + 1, func) == x**2 + y**2 + z**2 + 1 + assert epath("/*/*/Symbol", t + sin(x + 1) + cos(x + y + E), func) == \ + t + sin(x**2 + 1) + cos(x**2 + y**2 + E) + + +def test_EPath(): + assert EPath("/*/[0]")._path == "/*/[0]" + assert EPath(EPath("/*/[0]"))._path == "/*/[0]" + assert isinstance(epath("/*/[0]"), EPath) is True + + assert repr(EPath("/*/[0]")) == "EPath('/*/[0]')" + + raises(ValueError, lambda: EPath("")) + raises(ValueError, lambda: EPath("/")) + raises(ValueError, lambda: EPath("/|x")) + raises(ValueError, lambda: EPath("/[")) + raises(ValueError, lambda: EPath("/[0]%")) + + raises(NotImplementedError, lambda: EPath("Symbol")) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_fu.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_fu.py new file mode 100644 index 0000000000000000000000000000000000000000..2de2126b7333195fceeffe72dc9cb642e7eba9a9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_fu.py @@ -0,0 +1,492 @@ +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.parameters import evaluate +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.elementary.hyperbolic import (cosh, coth, csch, sech, sinh, tanh) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (cos, cot, csc, sec, sin, tan) +from sympy.simplify.powsimp import powsimp +from sympy.simplify.fu import ( + L, TR1, TR10, TR10i, TR11, _TR11, TR12, TR12i, TR13, TR14, TR15, TR16, + TR111, TR2, TR2i, TR3, TR4, TR5, TR6, TR7, TR8, TR9, TRmorrie, _TR56 as T, + TRpower, hyper_as_trig, fu, process_common_addends, trig_split, + as_f_sign_1) +from sympy.core.random import verify_numerically +from sympy.abc import a, b, c, x, y, z + + +def test_TR1(): + assert TR1(2*csc(x) + sec(x)) == 1/cos(x) + 2/sin(x) + + +def test_TR2(): + assert TR2(tan(x)) == sin(x)/cos(x) + assert TR2(cot(x)) == cos(x)/sin(x) + assert TR2(tan(tan(x) - sin(x)/cos(x))) == 0 + + +def test_TR2i(): + # just a reminder that ratios of powers only simplify if both + # numerator and denominator satisfy the condition that each + # has a positive base or an integer exponent; e.g. the following, + # at y=-1, x=1/2 gives sqrt(2)*I != -sqrt(2)*I + assert powsimp(2**x/y**x) != (2/y)**x + + assert TR2i(sin(x)/cos(x)) == tan(x) + assert TR2i(sin(x)*sin(y)/cos(x)) == tan(x)*sin(y) + assert TR2i(1/(sin(x)/cos(x))) == 1/tan(x) + assert TR2i(1/(sin(x)*sin(y)/cos(x))) == 1/tan(x)/sin(y) + assert TR2i(sin(x)/2/(cos(x) + 1)) == sin(x)/(cos(x) + 1)/2 + + assert TR2i(sin(x)/2/(cos(x) + 1), half=True) == tan(x/2)/2 + assert TR2i(sin(1)/(cos(1) + 1), half=True) == tan(S.Half) + assert TR2i(sin(2)/(cos(2) + 1), half=True) == tan(1) + assert TR2i(sin(4)/(cos(4) + 1), half=True) == tan(2) + assert TR2i(sin(5)/(cos(5) + 1), half=True) == tan(5*S.Half) + assert TR2i((cos(1) + 1)/sin(1), half=True) == 1/tan(S.Half) + assert TR2i((cos(2) + 1)/sin(2), half=True) == 1/tan(1) + assert TR2i((cos(4) + 1)/sin(4), half=True) == 1/tan(2) + assert TR2i((cos(5) + 1)/sin(5), half=True) == 1/tan(5*S.Half) + assert TR2i((cos(1) + 1)**(-a)*sin(1)**a, half=True) == tan(S.Half)**a + assert TR2i((cos(2) + 1)**(-a)*sin(2)**a, half=True) == tan(1)**a + assert TR2i((cos(4) + 1)**(-a)*sin(4)**a, half=True) == (cos(4) + 1)**(-a)*sin(4)**a + assert TR2i((cos(5) + 1)**(-a)*sin(5)**a, half=True) == (cos(5) + 1)**(-a)*sin(5)**a + assert TR2i((cos(1) + 1)**a*sin(1)**(-a), half=True) == tan(S.Half)**(-a) + assert TR2i((cos(2) + 1)**a*sin(2)**(-a), half=True) == tan(1)**(-a) + assert TR2i((cos(4) + 1)**a*sin(4)**(-a), half=True) == (cos(4) + 1)**a*sin(4)**(-a) + assert TR2i((cos(5) + 1)**a*sin(5)**(-a), half=True) == (cos(5) + 1)**a*sin(5)**(-a) + + i = symbols('i', integer=True) + assert TR2i(((cos(5) + 1)**i*sin(5)**(-i)), half=True) == tan(5*S.Half)**(-i) + assert TR2i(1/((cos(5) + 1)**i*sin(5)**(-i)), half=True) == tan(5*S.Half)**i + + +def test_TR3(): + assert TR3(cos(y - x*(y - x))) == cos(x*(x - y) + y) + assert cos(pi/2 + x) == -sin(x) + assert cos(30*pi/2 + x) == -cos(x) + + for f in (cos, sin, tan, cot, csc, sec): + i = f(pi*Rational(3, 7)) + j = TR3(i) + assert verify_numerically(i, j) and i.func != j.func + + with evaluate(False): + eq = cos(9*pi/22) + assert eq.has(9*pi) and TR3(eq) == sin(pi/11) + + +def test_TR4(): + for i in [0, pi/6, pi/4, pi/3, pi/2]: + with evaluate(False): + eq = cos(i) + assert isinstance(eq, cos) and TR4(eq) == cos(i) + + +def test__TR56(): + h = lambda x: 1 - x + assert T(sin(x)**3, sin, cos, h, 4, False) == sin(x)*(-cos(x)**2 + 1) + assert T(sin(x)**10, sin, cos, h, 4, False) == sin(x)**10 + assert T(sin(x)**6, sin, cos, h, 6, False) == (-cos(x)**2 + 1)**3 + assert T(sin(x)**6, sin, cos, h, 6, True) == sin(x)**6 + assert T(sin(x)**8, sin, cos, h, 10, True) == (-cos(x)**2 + 1)**4 + + # issue 17137 + assert T(sin(x)**I, sin, cos, h, 4, True) == sin(x)**I + assert T(sin(x)**(2*I + 1), sin, cos, h, 4, True) == sin(x)**(2*I + 1) + + +def test_TR5(): + assert TR5(sin(x)**2) == -cos(x)**2 + 1 + assert TR5(sin(x)**-2) == sin(x)**(-2) + assert TR5(sin(x)**4) == (-cos(x)**2 + 1)**2 + + +def test_TR6(): + assert TR6(cos(x)**2) == -sin(x)**2 + 1 + assert TR6(cos(x)**-2) == cos(x)**(-2) + assert TR6(cos(x)**4) == (-sin(x)**2 + 1)**2 + + +def test_TR7(): + assert TR7(cos(x)**2) == cos(2*x)/2 + S.Half + assert TR7(cos(x)**2 + 1) == cos(2*x)/2 + Rational(3, 2) + + +def test_TR8(): + assert TR8(cos(2)*cos(3)) == cos(5)/2 + cos(1)/2 + assert TR8(cos(2)*sin(3)) == sin(5)/2 + sin(1)/2 + assert TR8(sin(2)*sin(3)) == -cos(5)/2 + cos(1)/2 + assert TR8(sin(1)*sin(2)*sin(3)) == sin(4)/4 - sin(6)/4 + sin(2)/4 + assert TR8(cos(2)*cos(3)*cos(4)*cos(5)) == \ + cos(4)/4 + cos(10)/8 + cos(2)/8 + cos(8)/8 + cos(14)/8 + \ + cos(6)/8 + Rational(1, 8) + assert TR8(cos(2)*cos(3)*cos(4)*cos(5)*cos(6)) == \ + cos(10)/8 + cos(4)/8 + 3*cos(2)/16 + cos(16)/16 + cos(8)/8 + \ + cos(14)/16 + cos(20)/16 + cos(12)/16 + Rational(1, 16) + cos(6)/8 + assert TR8(sin(pi*Rational(3, 7))**2*cos(pi*Rational(3, 7))**2/(16*sin(pi/7)**2)) == Rational(1, 64) + +def test_TR9(): + a = S.Half + b = 3*a + assert TR9(a) == a + assert TR9(cos(1) + cos(2)) == 2*cos(a)*cos(b) + assert TR9(cos(1) - cos(2)) == 2*sin(a)*sin(b) + assert TR9(sin(1) - sin(2)) == -2*sin(a)*cos(b) + assert TR9(sin(1) + sin(2)) == 2*sin(b)*cos(a) + assert TR9(cos(1) + 2*sin(1) + 2*sin(2)) == cos(1) + 4*sin(b)*cos(a) + assert TR9(cos(4) + cos(2) + 2*cos(1)*cos(3)) == 4*cos(1)*cos(3) + assert TR9((cos(4) + cos(2))/cos(3)/2 + cos(3)) == 2*cos(1)*cos(2) + assert TR9(cos(3) + cos(4) + cos(5) + cos(6)) == \ + 4*cos(S.Half)*cos(1)*cos(Rational(9, 2)) + assert TR9(cos(3) + cos(3)*cos(2)) == cos(3) + cos(2)*cos(3) + assert TR9(-cos(y) + cos(x*y)) == -2*sin(x*y/2 - y/2)*sin(x*y/2 + y/2) + assert TR9(-sin(y) + sin(x*y)) == 2*sin(x*y/2 - y/2)*cos(x*y/2 + y/2) + c = cos(x) + s = sin(x) + for si in ((1, 1), (1, -1), (-1, 1), (-1, -1)): + for a in ((c, s), (s, c), (cos(x), cos(x*y)), (sin(x), sin(x*y))): + args = zip(si, a) + ex = Add(*[Mul(*ai) for ai in args]) + t = TR9(ex) + assert not (a[0].func == a[1].func and ( + not verify_numerically(ex, t.expand(trig=True)) or t.is_Add) + or a[1].func != a[0].func and ex != t) + + +def test_TR10(): + assert TR10(cos(a + b)) == -sin(a)*sin(b) + cos(a)*cos(b) + assert TR10(sin(a + b)) == sin(a)*cos(b) + sin(b)*cos(a) + assert TR10(sin(a + b + c)) == \ + (-sin(a)*sin(b) + cos(a)*cos(b))*sin(c) + \ + (sin(a)*cos(b) + sin(b)*cos(a))*cos(c) + assert TR10(cos(a + b + c)) == \ + (-sin(a)*sin(b) + cos(a)*cos(b))*cos(c) - \ + (sin(a)*cos(b) + sin(b)*cos(a))*sin(c) + + +def test_TR10i(): + assert TR10i(cos(1)*cos(3) + sin(1)*sin(3)) == cos(2) + assert TR10i(cos(1)*cos(3) - sin(1)*sin(3)) == cos(4) + assert TR10i(cos(1)*sin(3) - sin(1)*cos(3)) == sin(2) + assert TR10i(cos(1)*sin(3) + sin(1)*cos(3)) == sin(4) + assert TR10i(cos(1)*sin(3) + sin(1)*cos(3) + 7) == sin(4) + 7 + assert TR10i(cos(1)*sin(3) + sin(1)*cos(3) + cos(3)) == cos(3) + sin(4) + assert TR10i(2*cos(1)*sin(3) + 2*sin(1)*cos(3) + cos(3)) == \ + 2*sin(4) + cos(3) + assert TR10i(cos(2)*cos(3) + sin(2)*(cos(1)*sin(2) + cos(2)*sin(1))) == \ + cos(1) + eq = (cos(2)*cos(3) + sin(2)*( + cos(1)*sin(2) + cos(2)*sin(1)))*cos(5) + sin(1)*sin(5) + assert TR10i(eq) == TR10i(eq.expand()) == cos(4) + assert TR10i(sqrt(2)*cos(x)*x + sqrt(6)*sin(x)*x) == \ + 2*sqrt(2)*x*sin(x + pi/6) + assert TR10i(cos(x)/sqrt(6) + sin(x)/sqrt(2) + + cos(x)/sqrt(6)/3 + sin(x)/sqrt(2)/3) == 4*sqrt(6)*sin(x + pi/6)/9 + assert TR10i(cos(x)/sqrt(6) + sin(x)/sqrt(2) + + cos(y)/sqrt(6)/3 + sin(y)/sqrt(2)/3) == \ + sqrt(6)*sin(x + pi/6)/3 + sqrt(6)*sin(y + pi/6)/9 + assert TR10i(cos(x) + sqrt(3)*sin(x) + 2*sqrt(3)*cos(x + pi/6)) == 4*cos(x) + assert TR10i(cos(x) + sqrt(3)*sin(x) + + 2*sqrt(3)*cos(x + pi/6) + 4*sin(x)) == 4*sqrt(2)*sin(x + pi/4) + assert TR10i(cos(2)*sin(3) + sin(2)*cos(4)) == \ + sin(2)*cos(4) + sin(3)*cos(2) + + A = Symbol('A', commutative=False) + assert TR10i(sqrt(2)*cos(x)*A + sqrt(6)*sin(x)*A) == \ + 2*sqrt(2)*sin(x + pi/6)*A + + + c = cos(x) + s = sin(x) + h = sin(y) + r = cos(y) + for si in ((1, 1), (1, -1), (-1, 1), (-1, -1)): + for argsi in ((c*r, s*h), (c*h, s*r)): # explicit 2-args + args = zip(si, argsi) + ex = Add(*[Mul(*ai) for ai in args]) + t = TR10i(ex) + assert not (ex - t.expand(trig=True) or t.is_Add) + + c = cos(x) + s = sin(x) + h = sin(pi/6) + r = cos(pi/6) + for si in ((1, 1), (1, -1), (-1, 1), (-1, -1)): + for argsi in ((c*r, s*h), (c*h, s*r)): # induced + args = zip(si, argsi) + ex = Add(*[Mul(*ai) for ai in args]) + t = TR10i(ex) + assert not (ex - t.expand(trig=True) or t.is_Add) + + +def test_TR11(): + + assert TR11(sin(2*x)) == 2*sin(x)*cos(x) + assert TR11(sin(4*x)) == 4*((-sin(x)**2 + cos(x)**2)*sin(x)*cos(x)) + assert TR11(sin(x*Rational(4, 3))) == \ + 4*((-sin(x/3)**2 + cos(x/3)**2)*sin(x/3)*cos(x/3)) + + assert TR11(cos(2*x)) == -sin(x)**2 + cos(x)**2 + assert TR11(cos(4*x)) == \ + (-sin(x)**2 + cos(x)**2)**2 - 4*sin(x)**2*cos(x)**2 + + assert TR11(cos(2)) == cos(2) + + assert TR11(cos(pi*Rational(3, 7)), pi*Rational(2, 7)) == -cos(pi*Rational(2, 7))**2 + sin(pi*Rational(2, 7))**2 + assert TR11(cos(4), 2) == -sin(2)**2 + cos(2)**2 + assert TR11(cos(6), 2) == cos(6) + assert TR11(sin(x)/cos(x/2), x/2) == 2*sin(x/2) + +def test__TR11(): + + assert _TR11(sin(x/3)*sin(2*x)*sin(x/4)/(cos(x/6)*cos(x/8))) == \ + 4*sin(x/8)*sin(x/6)*sin(2*x),_TR11(sin(x/3)*sin(2*x)*sin(x/4)/(cos(x/6)*cos(x/8))) + assert _TR11(sin(x/3)/cos(x/6)) == 2*sin(x/6) + + assert _TR11(cos(x/6)/sin(x/3)) == 1/(2*sin(x/6)) + assert _TR11(sin(2*x)*cos(x/8)/sin(x/4)) == sin(2*x)/(2*sin(x/8)), _TR11(sin(2*x)*cos(x/8)/sin(x/4)) + assert _TR11(sin(x)/sin(x/2)) == 2*cos(x/2) + + +def test_TR12(): + assert TR12(tan(x + y)) == (tan(x) + tan(y))/(-tan(x)*tan(y) + 1) + assert TR12(tan(x + y + z)) ==\ + (tan(z) + (tan(x) + tan(y))/(-tan(x)*tan(y) + 1))/( + 1 - (tan(x) + tan(y))*tan(z)/(-tan(x)*tan(y) + 1)) + assert TR12(tan(x*y)) == tan(x*y) + + +def test_TR13(): + assert TR13(tan(3)*tan(2)) == -tan(2)/tan(5) - tan(3)/tan(5) + 1 + assert TR13(cot(3)*cot(2)) == 1 + cot(3)*cot(5) + cot(2)*cot(5) + assert TR13(tan(1)*tan(2)*tan(3)) == \ + (-tan(2)/tan(5) - tan(3)/tan(5) + 1)*tan(1) + assert TR13(tan(1)*tan(2)*cot(3)) == \ + (-tan(2)/tan(3) + 1 - tan(1)/tan(3))*cot(3) + + +def test_L(): + assert L(cos(x) + sin(x)) == 2 + + +def test_fu(): + + assert fu(sin(50)**2 + cos(50)**2 + sin(pi/6)) == Rational(3, 2) + assert fu(sqrt(6)*cos(x) + sqrt(2)*sin(x)) == 2*sqrt(2)*sin(x + pi/3) + + + eq = sin(x)**4 - cos(y)**2 + sin(y)**2 + 2*cos(x)**2 + assert fu(eq) == cos(x)**4 - 2*cos(y)**2 + 2 + + assert fu(S.Half - cos(2*x)/2) == sin(x)**2 + + assert fu(sin(a)*(cos(b) - sin(b)) + cos(a)*(sin(b) + cos(b))) == \ + sqrt(2)*sin(a + b + pi/4) + + assert fu(sqrt(3)*cos(x)/2 + sin(x)/2) == sin(x + pi/3) + + assert fu(1 - sin(2*x)**2/4 - sin(y)**2 - cos(x)**4) == \ + -cos(x)**2 + cos(y)**2 + + assert fu(cos(pi*Rational(4, 9))) == sin(pi/18) + assert fu(cos(pi/9)*cos(pi*Rational(2, 9))*cos(pi*Rational(3, 9))*cos(pi*Rational(4, 9))) == Rational(1, 16) + + assert fu( + tan(pi*Rational(7, 18)) + tan(pi*Rational(5, 18)) - sqrt(3)*tan(pi*Rational(5, 18))*tan(pi*Rational(7, 18))) == \ + -sqrt(3) + + assert fu(tan(1)*tan(2)) == tan(1)*tan(2) + + expr = Mul(*[cos(2**i) for i in range(10)]) + assert fu(expr) == sin(1024)/(1024*sin(1)) + + # issue #18059: + assert fu(cos(x) + sqrt(sin(x)**2)) == cos(x) + sqrt(sin(x)**2) + + assert fu((-14*sin(x)**3 + 35*sin(x) + 6*sqrt(3)*cos(x)**3 + 9*sqrt(3)*cos(x))/((cos(2*x) + 4))) == \ + 7*sin(x) + 3*sqrt(3)*cos(x) + + +def test_objective(): + assert fu(sin(x)/cos(x), measure=lambda x: x.count_ops()) == \ + tan(x) + assert fu(sin(x)/cos(x), measure=lambda x: -x.count_ops()) == \ + sin(x)/cos(x) + + +def test_process_common_addends(): + # this tests that the args are not evaluated as they are given to do + # and that key2 works when key1 is False + do = lambda x: Add(*[i**(i%2) for i in x.args]) + assert process_common_addends(Add(*[1, 2, 3, 4], evaluate=False), do, + key2=lambda x: x%2, key1=False) == 1**1 + 3**1 + 2**0 + 4**0 + + +def test_trig_split(): + assert trig_split(cos(x), cos(y)) == (1, 1, 1, x, y, True) + assert trig_split(2*cos(x), -2*cos(y)) == (2, 1, -1, x, y, True) + assert trig_split(cos(x)*sin(y), cos(y)*sin(y)) == \ + (sin(y), 1, 1, x, y, True) + + assert trig_split(cos(x), -sqrt(3)*sin(x), two=True) == \ + (2, 1, -1, x, pi/6, False) + assert trig_split(cos(x), sin(x), two=True) == \ + (sqrt(2), 1, 1, x, pi/4, False) + assert trig_split(cos(x), -sin(x), two=True) == \ + (sqrt(2), 1, -1, x, pi/4, False) + assert trig_split(sqrt(2)*cos(x), -sqrt(6)*sin(x), two=True) == \ + (2*sqrt(2), 1, -1, x, pi/6, False) + assert trig_split(-sqrt(6)*cos(x), -sqrt(2)*sin(x), two=True) == \ + (-2*sqrt(2), 1, 1, x, pi/3, False) + assert trig_split(cos(x)/sqrt(6), sin(x)/sqrt(2), two=True) == \ + (sqrt(6)/3, 1, 1, x, pi/6, False) + assert trig_split(-sqrt(6)*cos(x)*sin(y), + -sqrt(2)*sin(x)*sin(y), two=True) == \ + (-2*sqrt(2)*sin(y), 1, 1, x, pi/3, False) + + assert trig_split(cos(x), sin(x)) is None + assert trig_split(cos(x), sin(z)) is None + assert trig_split(2*cos(x), -sin(x)) is None + assert trig_split(cos(x), -sqrt(3)*sin(x)) is None + assert trig_split(cos(x)*cos(y), sin(x)*sin(z)) is None + assert trig_split(cos(x)*cos(y), sin(x)*sin(y)) is None + assert trig_split(-sqrt(6)*cos(x), sqrt(2)*sin(x)*sin(y), two=True) is \ + None + + assert trig_split(sqrt(3)*sqrt(x), cos(3), two=True) is None + assert trig_split(sqrt(3)*root(x, 3), sin(3)*cos(2), two=True) is None + assert trig_split(cos(5)*cos(6), cos(7)*sin(5), two=True) is None + + +def test_TRmorrie(): + assert TRmorrie(7*Mul(*[cos(i) for i in range(10)])) == \ + 7*sin(12)*sin(16)*cos(5)*cos(7)*cos(9)/(64*sin(1)*sin(3)) + assert TRmorrie(x) == x + assert TRmorrie(2*x) == 2*x + e = cos(pi/7)*cos(pi*Rational(2, 7))*cos(pi*Rational(4, 7)) + assert TR8(TRmorrie(e)) == Rational(-1, 8) + e = Mul(*[cos(2**i*pi/17) for i in range(1, 17)]) + assert TR8(TR3(TRmorrie(e))) == Rational(1, 65536) + # issue 17063 + eq = cos(x)/cos(x/2) + assert TRmorrie(eq) == eq + # issue #20430 + eq = cos(x/2)*sin(x/2)*cos(x)**3 + assert TRmorrie(eq) == sin(2*x)*cos(x)**2/4 + + +def test_TRpower(): + assert TRpower(1/sin(x)**2) == 1/sin(x)**2 + assert TRpower(cos(x)**3*sin(x/2)**4) == \ + (3*cos(x)/4 + cos(3*x)/4)*(-cos(x)/2 + cos(2*x)/8 + Rational(3, 8)) + for k in range(2, 8): + assert verify_numerically(sin(x)**k, TRpower(sin(x)**k)) + assert verify_numerically(cos(x)**k, TRpower(cos(x)**k)) + + +def test_hyper_as_trig(): + from sympy.simplify.fu import _osborne, _osbornei + + eq = sinh(x)**2 + cosh(x)**2 + t, f = hyper_as_trig(eq) + assert f(fu(t)) == cosh(2*x) + e, f = hyper_as_trig(tanh(x + y)) + assert f(TR12(e)) == (tanh(x) + tanh(y))/(tanh(x)*tanh(y) + 1) + + d = Dummy() + assert _osborne(sinh(x), d) == I*sin(x*d) + assert _osborne(tanh(x), d) == I*tan(x*d) + assert _osborne(coth(x), d) == cot(x*d)/I + assert _osborne(cosh(x), d) == cos(x*d) + assert _osborne(sech(x), d) == sec(x*d) + assert _osborne(csch(x), d) == csc(x*d)/I + for func in (sinh, cosh, tanh, coth, sech, csch): + h = func(pi) + assert _osbornei(_osborne(h, d), d) == h + # /!\ the _osborne functions are not meant to work + # in the o(i(trig, d), d) direction so we just check + # that they work as they are supposed to work + assert _osbornei(cos(x*y + z), y) == cosh(x + z*I) + assert _osbornei(sin(x*y + z), y) == sinh(x + z*I)/I + assert _osbornei(tan(x*y + z), y) == tanh(x + z*I)/I + assert _osbornei(cot(x*y + z), y) == coth(x + z*I)*I + assert _osbornei(sec(x*y + z), y) == sech(x + z*I) + assert _osbornei(csc(x*y + z), y) == csch(x + z*I)*I + + +def test_TR12i(): + ta, tb, tc = [tan(i) for i in (a, b, c)] + assert TR12i((ta + tb)/(-ta*tb + 1)) == tan(a + b) + assert TR12i((ta + tb)/(ta*tb - 1)) == -tan(a + b) + assert TR12i((-ta - tb)/(ta*tb - 1)) == tan(a + b) + eq = (ta + tb)/(-ta*tb + 1)**2*(-3*ta - 3*tc)/(2*(ta*tc - 1)) + assert TR12i(eq.expand()) == \ + -3*tan(a + b)*tan(a + c)/(tan(a) + tan(b) - 1)/2 + assert TR12i(tan(x)/sin(x)) == tan(x)/sin(x) + eq = (ta + cos(2))/(-ta*tb + 1) + assert TR12i(eq) == eq + eq = (ta + tb + 2)**2/(-ta*tb + 1) + assert TR12i(eq) == eq + eq = ta/(-ta*tb + 1) + assert TR12i(eq) == eq + eq = (((ta + tb)*(a + 1)).expand())**2/(ta*tb - 1) + assert TR12i(eq) == -(a + 1)**2*tan(a + b) + + +def test_TR14(): + eq = (cos(x) - 1)*(cos(x) + 1) + ans = -sin(x)**2 + assert TR14(eq) == ans + assert TR14(1/eq) == 1/ans + assert TR14((cos(x) - 1)**2*(cos(x) + 1)**2) == ans**2 + assert TR14((cos(x) - 1)**2*(cos(x) + 1)**3) == ans**2*(cos(x) + 1) + assert TR14((cos(x) - 1)**3*(cos(x) + 1)**2) == ans**2*(cos(x) - 1) + eq = (cos(x) - 1)**y*(cos(x) + 1)**y + assert TR14(eq) == eq + eq = (cos(x) - 2)**y*(cos(x) + 1) + assert TR14(eq) == eq + eq = (tan(x) - 2)**2*(cos(x) + 1) + assert TR14(eq) == eq + i = symbols('i', integer=True) + assert TR14((cos(x) - 1)**i*(cos(x) + 1)**i) == ans**i + assert TR14((sin(x) - 1)**i*(sin(x) + 1)**i) == (-cos(x)**2)**i + # could use extraction in this case + eq = (cos(x) - 1)**(i + 1)*(cos(x) + 1)**i + assert TR14(eq) in [(cos(x) - 1)*ans**i, eq] + + assert TR14((sin(x) - 1)*(sin(x) + 1)) == -cos(x)**2 + p1 = (cos(x) + 1)*(cos(x) - 1) + p2 = (cos(y) - 1)*2*(cos(y) + 1) + p3 = (3*(cos(y) - 1))*(3*(cos(y) + 1)) + assert TR14(p1*p2*p3*(x - 1)) == -18*((x - 1)*sin(x)**2*sin(y)**4) + + +def test_TR15_16_17(): + assert TR15(1 - 1/sin(x)**2) == -cot(x)**2 + assert TR16(1 - 1/cos(x)**2) == -tan(x)**2 + assert TR111(1 - 1/tan(x)**2) == 1 - cot(x)**2 + + +def test_as_f_sign_1(): + assert as_f_sign_1(x + 1) == (1, x, 1) + assert as_f_sign_1(x - 1) == (1, x, -1) + assert as_f_sign_1(-x + 1) == (-1, x, -1) + assert as_f_sign_1(-x - 1) == (-1, x, 1) + assert as_f_sign_1(2*x + 2) == (2, x, 1) + assert as_f_sign_1(x*y - y) == (y, x, -1) + assert as_f_sign_1(-x*y + y) == (-y, x, -1) + + +def test_issue_25590(): + A = Symbol('A', commutative=False) + B = Symbol('B', commutative=False) + + assert TR8(2*cos(x)*sin(x)*B*A) == sin(2*x)*B*A + assert TR13(tan(2)*tan(3)*B*A) == (-tan(2)/tan(5) - tan(3)/tan(5) + 1)*B*A + + # XXX The result may not be optimal than + # sin(2*x)*B*A + cos(x)**2 and may change in the future + assert (2*cos(x)*sin(x)*B*A + cos(x)**2).simplify() == sin(2*x)*B*A + cos(2*x)/2 + S.One/2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_function.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_function.py new file mode 100644 index 0000000000000000000000000000000000000000..441b9faf1bb3c5e7f2279b2a61066d050e45f773 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_function.py @@ -0,0 +1,54 @@ +""" Unit tests for Hyper_Function""" +from sympy.core import symbols, Dummy, Tuple, S, Rational +from sympy.functions import hyper + +from sympy.simplify.hyperexpand import Hyper_Function + +def test_attrs(): + a, b = symbols('a, b', cls=Dummy) + f = Hyper_Function([2, a], [b]) + assert f.ap == Tuple(2, a) + assert f.bq == Tuple(b) + assert f.args == (Tuple(2, a), Tuple(b)) + assert f.sizes == (2, 1) + +def test_call(): + a, b, x = symbols('a, b, x', cls=Dummy) + f = Hyper_Function([2, a], [b]) + assert f(x) == hyper([2, a], [b], x) + +def test_has(): + a, b, c = symbols('a, b, c', cls=Dummy) + f = Hyper_Function([2, -a], [b]) + assert f.has(a) + assert f.has(Tuple(b)) + assert not f.has(c) + +def test_eq(): + assert Hyper_Function([1], []) == Hyper_Function([1], []) + assert (Hyper_Function([1], []) != Hyper_Function([1], [])) is False + assert Hyper_Function([1], []) != Hyper_Function([2], []) + assert Hyper_Function([1], []) != Hyper_Function([1, 2], []) + assert Hyper_Function([1], []) != Hyper_Function([1], [2]) + +def test_gamma(): + assert Hyper_Function([2, 3], [-1]).gamma == 0 + assert Hyper_Function([-2, -3], [-1]).gamma == 2 + n = Dummy(integer=True) + assert Hyper_Function([-1, n, 1], []).gamma == 1 + assert Hyper_Function([-1, -n, 1], []).gamma == 1 + p = Dummy(integer=True, positive=True) + assert Hyper_Function([-1, p, 1], []).gamma == 1 + assert Hyper_Function([-1, -p, 1], []).gamma == 2 + +def test_suitable_origin(): + assert Hyper_Function((S.Half,), (Rational(3, 2),))._is_suitable_origin() is True + assert Hyper_Function((S.Half,), (S.Half,))._is_suitable_origin() is False + assert Hyper_Function((S.Half,), (Rational(-1, 2),))._is_suitable_origin() is False + assert Hyper_Function((S.Half,), (0,))._is_suitable_origin() is False + assert Hyper_Function((S.Half,), (-1, 1,))._is_suitable_origin() is False + assert Hyper_Function((S.Half, 0), (1,))._is_suitable_origin() is False + assert Hyper_Function((S.Half, 1), + (2, Rational(-2, 3)))._is_suitable_origin() is True + assert Hyper_Function((S.Half, 1), + (2, Rational(-2, 3), Rational(3, 2)))._is_suitable_origin() is True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_gammasimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_gammasimp.py new file mode 100644 index 0000000000000000000000000000000000000000..e4c73093250b279510e3c2274db22818a9adffd8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_gammasimp.py @@ -0,0 +1,127 @@ +from sympy.core.function import Function +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.combinatorial.factorials import (rf, binomial, factorial) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.gamma_functions import gamma +from sympy.simplify.gammasimp import gammasimp +from sympy.simplify.powsimp import powsimp +from sympy.simplify.simplify import simplify + +from sympy.abc import x, y, n, k + + +def test_gammasimp(): + R = Rational + + # was part of test_combsimp_gamma() in test_combsimp.py + assert gammasimp(gamma(x)) == gamma(x) + assert gammasimp(gamma(x + 1)/x) == gamma(x) + assert gammasimp(gamma(x)/(x - 1)) == gamma(x - 1) + assert gammasimp(x*gamma(x)) == gamma(x + 1) + assert gammasimp((x + 1)*gamma(x + 1)) == gamma(x + 2) + assert gammasimp(gamma(x + y)*(x + y)) == gamma(x + y + 1) + assert gammasimp(x/gamma(x + 1)) == 1/gamma(x) + assert gammasimp((x + 1)**2/gamma(x + 2)) == (x + 1)/gamma(x + 1) + assert gammasimp(x*gamma(x) + gamma(x + 3)/(x + 2)) == \ + (x + 2)*gamma(x + 1) + + assert gammasimp(gamma(2*x)*x) == gamma(2*x + 1)/2 + assert gammasimp(gamma(2*x)/(x - S.Half)) == 2*gamma(2*x - 1) + + assert gammasimp(gamma(x)*gamma(1 - x)) == pi/sin(pi*x) + assert gammasimp(gamma(x)*gamma(-x)) == -pi/(x*sin(pi*x)) + assert gammasimp(1/gamma(x + 3)/gamma(1 - x)) == \ + sin(pi*x)/(pi*x*(x + 1)*(x + 2)) + + assert gammasimp(factorial(n + 2)) == gamma(n + 3) + assert gammasimp(binomial(n, k)) == \ + gamma(n + 1)/(gamma(k + 1)*gamma(-k + n + 1)) + + assert powsimp(gammasimp( + gamma(x)*gamma(x + S.Half)*gamma(y)/gamma(x + y))) == \ + 2**(-2*x + 1)*sqrt(pi)*gamma(2*x)*gamma(y)/gamma(x + y) + assert gammasimp(1/gamma(x)/gamma(x - Rational(1, 3))/gamma(x + Rational(1, 3))) == \ + 3**(3*x - Rational(3, 2))/(2*pi*gamma(3*x - 1)) + assert simplify( + gamma(S.Half + x/2)*gamma(1 + x/2)/gamma(1 + x)/sqrt(pi)*2**x) == 1 + assert gammasimp(gamma(Rational(-1, 4))*gamma(Rational(-3, 4))) == 16*sqrt(2)*pi/3 + + assert powsimp(gammasimp(gamma(2*x)/gamma(x))) == \ + 2**(2*x - 1)*gamma(x + S.Half)/sqrt(pi) + + # issue 6792 + e = (-gamma(k)*gamma(k + 2) + gamma(k + 1)**2)/gamma(k)**2 + assert gammasimp(e) == -k + assert gammasimp(1/e) == -1/k + e = (gamma(x) + gamma(x + 1))/gamma(x) + assert gammasimp(e) == x + 1 + assert gammasimp(1/e) == 1/(x + 1) + e = (gamma(x) + gamma(x + 2))*(gamma(x - 1) + gamma(x))/gamma(x) + assert gammasimp(e) == (x**2 + x + 1)*gamma(x + 1)/(x - 1) + e = (-gamma(k)*gamma(k + 2) + gamma(k + 1)**2)/gamma(k)**2 + assert gammasimp(e**2) == k**2 + assert gammasimp(e**2/gamma(k + 1)) == k/gamma(k) + a = R(1, 2) + R(1, 3) + b = a + R(1, 3) + assert gammasimp(gamma(2*k)/gamma(k)*gamma(k + a)*gamma(k + b) + ) == 3*2**(2*k + 1)*3**(-3*k - 2)*sqrt(pi)*gamma(3*k + R(3, 2))/2 + + # issue 9699 + assert gammasimp((x + 1)*factorial(x)/gamma(y)) == gamma(x + 2)/gamma(y) + assert gammasimp(rf(x + n, k)*binomial(n, k)).simplify() == Piecewise( + (gamma(n + 1)*gamma(k + n + x)/(gamma(k + 1)*gamma(n + x)*gamma(-k + n + 1)), n > -x), + ((-1)**k*gamma(n + 1)*gamma(-n - x + 1)/(gamma(k + 1)*gamma(-k + n + 1)*gamma(-k - n - x + 1)), True)) + + A, B = symbols('A B', commutative=False) + assert gammasimp(e*B*A) == gammasimp(e)*B*A + + # check iteration + assert gammasimp(gamma(2*k)/gamma(k)*gamma(-k - R(1, 2))) == ( + -2**(2*k + 1)*sqrt(pi)/(2*((2*k + 1)*cos(pi*k)))) + assert gammasimp( + gamma(k)*gamma(k + R(1, 3))*gamma(k + R(2, 3))/gamma(k*R(3, 2))) == ( + 3*2**(3*k + 1)*3**(-3*k - S.Half)*sqrt(pi)*gamma(k*R(3, 2) + S.Half)/2) + + # issue 6153 + assert gammasimp(gamma(Rational(1, 4))/gamma(Rational(5, 4))) == 4 + + # was part of test_combsimp() in test_combsimp.py + assert gammasimp(binomial(n + 2, k + S.Half)) == gamma(n + 3)/ \ + (gamma(k + R(3, 2))*gamma(-k + n + R(5, 2))) + assert gammasimp(binomial(n + 2, k + 2.0)) == \ + gamma(n + 3)/(gamma(k + 3.0)*gamma(-k + n + 1)) + + # issue 11548 + assert gammasimp(binomial(0, x)) == sin(pi*x)/(pi*x) + + e = gamma(n + Rational(1, 3))*gamma(n + R(2, 3)) + assert gammasimp(e) == e + assert gammasimp(gamma(4*n + S.Half)/gamma(2*n - R(3, 4))) == \ + 2**(4*n - R(5, 2))*(8*n - 3)*gamma(2*n + R(3, 4))/sqrt(pi) + + i, m = symbols('i m', integer = True) + e = gamma(exp(i)) + assert gammasimp(e) == e + e = gamma(m + 3) + assert gammasimp(e) == e + e = gamma(m + 1)/(gamma(i + 1)*gamma(-i + m + 1)) + assert gammasimp(e) == e + + p = symbols("p", integer=True, positive=True) + assert gammasimp(gamma(-p + 4)) == gamma(-p + 4) + + +def test_issue_22606(): + fx = Function('f')(x) + eq = x + gamma(y) + # seems like ans should be `eq`, not `(x*y + gamma(y + 1))/y` + ans = gammasimp(eq) + assert gammasimp(eq.subs(x, fx)).subs(fx, x) == ans + assert gammasimp(eq.subs(x, cos(x))).subs(cos(x), x) == ans + assert 1/gammasimp(1/eq) == ans + assert gammasimp(fx.subs(x, eq)).args[0] == ans diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_hyperexpand.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_hyperexpand.py new file mode 100644 index 0000000000000000000000000000000000000000..c703c228a13201de13cfd4c3413fc75a2cf5bdb6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_hyperexpand.py @@ -0,0 +1,1063 @@ +from sympy.core.random import randrange + +from sympy.simplify.hyperexpand import (ShiftA, ShiftB, UnShiftA, UnShiftB, + MeijerShiftA, MeijerShiftB, MeijerShiftC, MeijerShiftD, + MeijerUnShiftA, MeijerUnShiftB, MeijerUnShiftC, + MeijerUnShiftD, + ReduceOrder, reduce_order, apply_operators, + devise_plan, make_derivative_operator, Formula, + hyperexpand, Hyper_Function, G_Function, + reduce_order_meijer, + build_hypergeometric_formula) +from sympy.concrete.summations import Sum +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.numbers import I +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.combinatorial.factorials import binomial +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.special.hyper import (hyper, meijerg) +from sympy.abc import z, a, b, c +from sympy.testing.pytest import XFAIL, raises, slow, tooslow +from sympy.core.random import verify_numerically as tn + +from sympy.core.numbers import (Rational, pi) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import atanh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (asin, cos, sin) +from sympy.functions.special.bessel import besseli +from sympy.functions.special.error_functions import erf +from sympy.functions.special.gamma_functions import (gamma, lowergamma) + + +def test_branch_bug(): + assert hyperexpand(hyper((Rational(-1, 3), S.Half), (Rational(2, 3), Rational(3, 2)), -z)) == \ + -z**S('1/3')*lowergamma(exp_polar(I*pi)/3, z)/5 \ + + sqrt(pi)*erf(sqrt(z))/(5*sqrt(z)) + assert hyperexpand(meijerg([Rational(7, 6), 1], [], [Rational(2, 3)], [Rational(1, 6), 0], z)) == \ + 2*z**S('2/3')*(2*sqrt(pi)*erf(sqrt(z))/sqrt(z) - 2*lowergamma( + Rational(2, 3), z)/z**S('2/3'))*gamma(Rational(2, 3))/gamma(Rational(5, 3)) + + +def test_hyperexpand(): + # Luke, Y. L. (1969), The Special Functions and Their Approximations, + # Volume 1, section 6.2 + + assert hyperexpand(hyper([], [], z)) == exp(z) + assert hyperexpand(hyper([1, 1], [2], -z)*z) == log(1 + z) + assert hyperexpand(hyper([], [S.Half], -z**2/4)) == cos(z) + assert hyperexpand(z*hyper([], [S('3/2')], -z**2/4)) == sin(z) + assert hyperexpand(hyper([S('1/2'), S('1/2')], [S('3/2')], z**2)*z) \ + == asin(z) + assert isinstance(Sum(binomial(2, z)*z**2, (z, 0, a)).doit(), Expr) + + +def can_do(ap, bq, numerical=True, div=1, lowerplane=False): + r = hyperexpand(hyper(ap, bq, z)) + if r.has(hyper): + return False + if not numerical: + return True + repl = {} + randsyms = r.free_symbols - {z} + while randsyms: + # Only randomly generated parameters are checked. + for n, ai in enumerate(randsyms): + repl[ai] = randcplx(n)/div + if not any(b.is_Integer and b <= 0 for b in Tuple(*bq).subs(repl)): + break + [a, b, c, d] = [2, -1, 3, 1] + if lowerplane: + [a, b, c, d] = [2, -2, 3, -1] + return tn( + hyper(ap, bq, z).subs(repl), + r.replace(exp_polar, exp).subs(repl), + z, a=a, b=b, c=c, d=d) + + +def test_roach(): + # Kelly B. Roach. Meijer G Function Representations. + # Section "Gallery" + assert can_do([S.Half], [Rational(9, 2)]) + assert can_do([], [1, Rational(5, 2), 4]) + assert can_do([Rational(-1, 2), 1, 2], [3, 4]) + assert can_do([Rational(1, 3)], [Rational(-2, 3), Rational(-1, 2), S.Half, 1]) + assert can_do([Rational(-3, 2), Rational(-1, 2)], [Rational(-5, 2), 1]) + assert can_do([Rational(-3, 2), ], [Rational(-1, 2), S.Half]) # shine-integral + assert can_do([Rational(-3, 2), Rational(-1, 2)], [2]) # elliptic integrals + + +@XFAIL +def test_roach_fail(): + assert can_do([Rational(-1, 2), 1], [Rational(1, 4), S.Half, Rational(3, 4)]) # PFDD + assert can_do([Rational(3, 2)], [Rational(5, 2), 5]) # struve function + assert can_do([Rational(-1, 2), S.Half, 1], [Rational(3, 2), Rational(5, 2)]) # polylog, pfdd + assert can_do([1, 2, 3], [S.Half, 4]) # XXX ? + assert can_do([S.Half], [Rational(-1, 3), Rational(-1, 2), Rational(-2, 3)]) # PFDD ? + +# For the long table tests, see end of file + + +def test_polynomial(): + from sympy.core.numbers import oo + assert hyperexpand(hyper([], [-1], z)) is oo + assert hyperexpand(hyper([-2], [-1], z)) is oo + assert hyperexpand(hyper([0, 0], [-1], z)) == 1 + assert can_do([-5, -2, randcplx(), randcplx()], [-10, randcplx()]) + assert hyperexpand(hyper((-1, 1), (-2,), z)) == 1 + z/2 + + +def test_hyperexpand_bases(): + assert hyperexpand(hyper([2], [a], z)) == \ + a + z**(-a + 1)*(-a**2 + 3*a + z*(a - 1) - 2)*exp(z)* \ + lowergamma(a - 1, z) - 1 + # TODO [a+1, aRational(-1, 2)], [2*a] + assert hyperexpand(hyper([1, 2], [3], z)) == -2/z - 2*log(-z + 1)/z**2 + assert hyperexpand(hyper([S.Half, 2], [Rational(3, 2)], z)) == \ + -1/(2*z - 2) + atanh(sqrt(z))/sqrt(z)/2 + assert hyperexpand(hyper([S.Half, S.Half], [Rational(5, 2)], z)) == \ + (-3*z + 3)/4/(z*sqrt(-z + 1)) \ + + (6*z - 3)*asin(sqrt(z))/(4*z**Rational(3, 2)) + assert hyperexpand(hyper([1, 2], [Rational(3, 2)], z)) == -1/(2*z - 2) \ + - asin(sqrt(z))/(sqrt(z)*(2*z - 2)*sqrt(-z + 1)) + assert hyperexpand(hyper([Rational(-1, 2) - 1, 1, 2], [S.Half, 3], z)) == \ + sqrt(z)*(z*Rational(6, 7) - Rational(6, 5))*atanh(sqrt(z)) \ + + (-30*z**2 + 32*z - 6)/35/z - 6*log(-z + 1)/(35*z**2) + assert hyperexpand(hyper([1 + S.Half, 1, 1], [2, 2], z)) == \ + -4*log(sqrt(-z + 1)/2 + S.Half)/z + # TODO hyperexpand(hyper([a], [2*a + 1], z)) + # TODO [S.Half, a], [Rational(3, 2), a+1] + assert hyperexpand(hyper([2], [b, 1], z)) == \ + z**(-b/2 + S.Half)*besseli(b - 1, 2*sqrt(z))*gamma(b) \ + + z**(-b/2 + 1)*besseli(b, 2*sqrt(z))*gamma(b) + # TODO [a], [a - S.Half, 2*a] + + +def test_hyperexpand_parametric(): + assert hyperexpand(hyper([a, S.Half + a], [S.Half], z)) \ + == (1 + sqrt(z))**(-2*a)/2 + (1 - sqrt(z))**(-2*a)/2 + assert hyperexpand(hyper([a, Rational(-1, 2) + a], [2*a], z)) \ + == 2**(2*a - 1)*((-z + 1)**S.Half + 1)**(-2*a + 1) + + +def test_shifted_sum(): + from sympy.simplify.simplify import simplify + assert simplify(hyperexpand(z**4*hyper([2], [3, S('3/2')], -z**2))) \ + == z*sin(2*z) + (-z**2 + S.Half)*cos(2*z) - S.Half + + +def _randrat(): + """ Steer clear of integers. """ + return S(randrange(25) + 10)/50 + + +def randcplx(offset=-1): + """ Polys is not good with real coefficients. """ + return _randrat() + I*_randrat() + I*(1 + offset) + + +@slow +def test_formulae(): + from sympy.simplify.hyperexpand import FormulaCollection + formulae = FormulaCollection().formulae + for formula in formulae: + h = formula.func(formula.z) + rep = {} + for n, sym in enumerate(formula.symbols): + rep[sym] = randcplx(n) + + # NOTE hyperexpand returns truly branched functions. We know we are + # on the main sheet, but numerical evaluation can still go wrong + # (e.g. if exp_polar cannot be evalf'd). + # Just replace all exp_polar by exp, this usually works. + + # first test if the closed-form is actually correct + h = h.subs(rep) + closed_form = formula.closed_form.subs(rep).rewrite('nonrepsmall') + z = formula.z + assert tn(h, closed_form.replace(exp_polar, exp), z) + + # now test the computed matrix + cl = (formula.C * formula.B)[0].subs(rep).rewrite('nonrepsmall') + assert tn(closed_form.replace( + exp_polar, exp), cl.replace(exp_polar, exp), z) + deriv1 = z*formula.B.applyfunc(lambda t: t.rewrite( + 'nonrepsmall')).diff(z) + deriv2 = formula.M * formula.B + for d1, d2 in zip(deriv1, deriv2): + assert tn(d1.subs(rep).replace(exp_polar, exp), + d2.subs(rep).rewrite('nonrepsmall').replace(exp_polar, exp), z) + + +def test_meijerg_formulae(): + from sympy.simplify.hyperexpand import MeijerFormulaCollection + formulae = MeijerFormulaCollection().formulae + for sig in formulae: + for formula in formulae[sig]: + g = meijerg(formula.func.an, formula.func.ap, + formula.func.bm, formula.func.bq, + formula.z) + rep = {} + for sym in formula.symbols: + rep[sym] = randcplx() + + # first test if the closed-form is actually correct + g = g.subs(rep) + closed_form = formula.closed_form.subs(rep) + z = formula.z + assert tn(g, closed_form, z) + + # now test the computed matrix + cl = (formula.C * formula.B)[0].subs(rep) + assert tn(closed_form, cl, z) + deriv1 = z*formula.B.diff(z) + deriv2 = formula.M * formula.B + for d1, d2 in zip(deriv1, deriv2): + assert tn(d1.subs(rep), d2.subs(rep), z) + + +def op(f): + return z*f.diff(z) + + +def test_plan(): + assert devise_plan(Hyper_Function([0], ()), + Hyper_Function([0], ()), z) == [] + with raises(ValueError): + devise_plan(Hyper_Function([1], ()), Hyper_Function((), ()), z) + with raises(ValueError): + devise_plan(Hyper_Function([2], [1]), Hyper_Function([2], [2]), z) + with raises(ValueError): + devise_plan(Hyper_Function([2], []), Hyper_Function([S("1/2")], []), z) + + # We cannot use pi/(10000 + n) because polys is insanely slow. + a1, a2, b1 = (randcplx(n) for n in range(3)) + b1 += 2*I + h = hyper([a1, a2], [b1], z) + + h2 = hyper((a1 + 1, a2), [b1], z) + assert tn(apply_operators(h, + devise_plan(Hyper_Function((a1 + 1, a2), [b1]), + Hyper_Function((a1, a2), [b1]), z), op), + h2, z) + + h2 = hyper((a1 + 1, a2 - 1), [b1], z) + assert tn(apply_operators(h, + devise_plan(Hyper_Function((a1 + 1, a2 - 1), [b1]), + Hyper_Function((a1, a2), [b1]), z), op), + h2, z) + + +def test_plan_derivatives(): + a1, a2, a3 = 1, 2, S('1/2') + b1, b2 = 3, S('5/2') + h = Hyper_Function((a1, a2, a3), (b1, b2)) + h2 = Hyper_Function((a1 + 1, a2 + 1, a3 + 2), (b1 + 1, b2 + 1)) + ops = devise_plan(h2, h, z) + f = Formula(h, z, h(z), []) + deriv = make_derivative_operator(f.M, z) + assert tn((apply_operators(f.C, ops, deriv)*f.B)[0], h2(z), z) + + h2 = Hyper_Function((a1, a2 - 1, a3 - 2), (b1 - 1, b2 - 1)) + ops = devise_plan(h2, h, z) + assert tn((apply_operators(f.C, ops, deriv)*f.B)[0], h2(z), z) + + +def test_reduction_operators(): + a1, a2, b1 = (randcplx(n) for n in range(3)) + h = hyper([a1], [b1], z) + + assert ReduceOrder(2, 0) is None + assert ReduceOrder(2, -1) is None + assert ReduceOrder(1, S('1/2')) is None + + h2 = hyper((a1, a2), (b1, a2), z) + assert tn(ReduceOrder(a2, a2).apply(h, op), h2, z) + + h2 = hyper((a1, a2 + 1), (b1, a2), z) + assert tn(ReduceOrder(a2 + 1, a2).apply(h, op), h2, z) + + h2 = hyper((a2 + 4, a1), (b1, a2), z) + assert tn(ReduceOrder(a2 + 4, a2).apply(h, op), h2, z) + + # test several step order reduction + ap = (a2 + 4, a1, b1 + 1) + bq = (a2, b1, b1) + func, ops = reduce_order(Hyper_Function(ap, bq)) + assert func.ap == (a1,) + assert func.bq == (b1,) + assert tn(apply_operators(h, ops, op), hyper(ap, bq, z), z) + + +def test_shift_operators(): + a1, a2, b1, b2, b3 = (randcplx(n) for n in range(5)) + h = hyper((a1, a2), (b1, b2, b3), z) + + raises(ValueError, lambda: ShiftA(0)) + raises(ValueError, lambda: ShiftB(1)) + + assert tn(ShiftA(a1).apply(h, op), hyper((a1 + 1, a2), (b1, b2, b3), z), z) + assert tn(ShiftA(a2).apply(h, op), hyper((a1, a2 + 1), (b1, b2, b3), z), z) + assert tn(ShiftB(b1).apply(h, op), hyper((a1, a2), (b1 - 1, b2, b3), z), z) + assert tn(ShiftB(b2).apply(h, op), hyper((a1, a2), (b1, b2 - 1, b3), z), z) + assert tn(ShiftB(b3).apply(h, op), hyper((a1, a2), (b1, b2, b3 - 1), z), z) + + +def test_ushift_operators(): + a1, a2, b1, b2, b3 = (randcplx(n) for n in range(5)) + h = hyper((a1, a2), (b1, b2, b3), z) + + raises(ValueError, lambda: UnShiftA((1,), (), 0, z)) + raises(ValueError, lambda: UnShiftB((), (-1,), 0, z)) + raises(ValueError, lambda: UnShiftA((1,), (0, -1, 1), 0, z)) + raises(ValueError, lambda: UnShiftB((0, 1), (1,), 0, z)) + + s = UnShiftA((a1, a2), (b1, b2, b3), 0, z) + assert tn(s.apply(h, op), hyper((a1 - 1, a2), (b1, b2, b3), z), z) + s = UnShiftA((a1, a2), (b1, b2, b3), 1, z) + assert tn(s.apply(h, op), hyper((a1, a2 - 1), (b1, b2, b3), z), z) + + s = UnShiftB((a1, a2), (b1, b2, b3), 0, z) + assert tn(s.apply(h, op), hyper((a1, a2), (b1 + 1, b2, b3), z), z) + s = UnShiftB((a1, a2), (b1, b2, b3), 1, z) + assert tn(s.apply(h, op), hyper((a1, a2), (b1, b2 + 1, b3), z), z) + s = UnShiftB((a1, a2), (b1, b2, b3), 2, z) + assert tn(s.apply(h, op), hyper((a1, a2), (b1, b2, b3 + 1), z), z) + + +def can_do_meijer(a1, a2, b1, b2, numeric=True): + """ + This helper function tries to hyperexpand() the meijer g-function + corresponding to the parameters a1, a2, b1, b2. + It returns False if this expansion still contains g-functions. + If numeric is True, it also tests the so-obtained formula numerically + (at random values) and returns False if the test fails. + Else it returns True. + """ + from sympy.core.function import expand + from sympy.functions.elementary.complexes import unpolarify + r = hyperexpand(meijerg(a1, a2, b1, b2, z)) + if r.has(meijerg): + return False + # NOTE hyperexpand() returns a truly branched function, whereas numerical + # evaluation only works on the main branch. Since we are evaluating on + # the main branch, this should not be a problem, but expressions like + # exp_polar(I*pi/2*x)**a are evaluated incorrectly. We thus have to get + # rid of them. The expand heuristically does this... + r = unpolarify(expand(r, force=True, power_base=True, power_exp=False, + mul=False, log=False, multinomial=False, basic=False)) + + if not numeric: + return True + + repl = {} + for n, ai in enumerate(meijerg(a1, a2, b1, b2, z).free_symbols - {z}): + repl[ai] = randcplx(n) + return tn(meijerg(a1, a2, b1, b2, z).subs(repl), r.subs(repl), z) + + +@slow +def test_meijerg_expand(): + from sympy.simplify.gammasimp import gammasimp + from sympy.simplify.simplify import simplify + # from mpmath docs + assert hyperexpand(meijerg([[], []], [[0], []], -z)) == exp(z) + + assert hyperexpand(meijerg([[1, 1], []], [[1], [0]], z)) == \ + log(z + 1) + assert hyperexpand(meijerg([[1, 1], []], [[1], [1]], z)) == \ + z/(z + 1) + assert hyperexpand(meijerg([[], []], [[S.Half], [0]], (z/2)**2)) \ + == sin(z)/sqrt(pi) + assert hyperexpand(meijerg([[], []], [[0], [S.Half]], (z/2)**2)) \ + == cos(z)/sqrt(pi) + assert can_do_meijer([], [a], [a - 1, a - S.Half], []) + assert can_do_meijer([], [], [a/2], [-a/2], False) # branches... + assert can_do_meijer([a], [b], [a], [b, a - 1]) + + # wikipedia + assert hyperexpand(meijerg([1], [], [], [0], z)) == \ + Piecewise((0, abs(z) < 1), (1, abs(1/z) < 1), + (meijerg([1], [], [], [0], z), True)) + assert hyperexpand(meijerg([], [1], [0], [], z)) == \ + Piecewise((1, abs(z) < 1), (0, abs(1/z) < 1), + (meijerg([], [1], [0], [], z), True)) + + # The Special Functions and their Approximations + assert can_do_meijer([], [], [a + b/2], [a, a - b/2, a + S.Half]) + assert can_do_meijer( + [], [], [a], [b], False) # branches only agree for small z + assert can_do_meijer([], [S.Half], [a], [-a]) + assert can_do_meijer([], [], [a, b], []) + assert can_do_meijer([], [], [a, b], []) + assert can_do_meijer([], [], [a, a + S.Half], [b, b + S.Half]) + assert can_do_meijer([], [], [a, -a], [0, S.Half], False) # dito + assert can_do_meijer([], [], [a, a + S.Half, b, b + S.Half], []) + assert can_do_meijer([S.Half], [], [0], [a, -a]) + assert can_do_meijer([S.Half], [], [a], [0, -a], False) # dito + assert can_do_meijer([], [a - S.Half], [a, b], [a - S.Half], False) + assert can_do_meijer([], [a + S.Half], [a + b, a - b, a], [], False) + assert can_do_meijer([a + S.Half], [], [b, 2*a - b, a], [], False) + + # This for example is actually zero. + assert can_do_meijer([], [], [], [a, b]) + + # Testing a bug: + assert hyperexpand(meijerg([0, 2], [], [], [-1, 1], z)) == \ + Piecewise((0, abs(z) < 1), + (z*(1 - 1/z**2)/2, abs(1/z) < 1), + (meijerg([0, 2], [], [], [-1, 1], z), True)) + + # Test that the simplest possible answer is returned: + assert gammasimp(simplify(hyperexpand( + meijerg([1], [1 - a], [-a/2, -a/2 + S.Half], [], 1/z)))) == \ + -2*sqrt(pi)*(sqrt(z + 1) + 1)**a/a + + # Test that hyper is returned + assert hyperexpand(meijerg([1], [], [a], [0, 0], z)) == hyper( + (a,), (a + 1, a + 1), z*exp_polar(I*pi))*z**a*gamma(a)/gamma(a + 1)**2 + + # Test place option + f = meijerg(((0, 1), ()), ((S.Half,), (0,)), z**2) + assert hyperexpand(f) == sqrt(pi)/sqrt(1 + z**(-2)) + assert hyperexpand(f, place=0) == sqrt(pi)*z/sqrt(z**2 + 1) + + +def test_meijerg_lookup(): + from sympy.functions.special.error_functions import (Ci, Si) + from sympy.functions.special.gamma_functions import uppergamma + assert hyperexpand(meijerg([a], [], [b, a], [], z)) == \ + z**b*exp(z)*gamma(-a + b + 1)*uppergamma(a - b, z) + assert hyperexpand(meijerg([0], [], [0, 0], [], z)) == \ + exp(z)*uppergamma(0, z) + assert can_do_meijer([a], [], [b, a + 1], []) + assert can_do_meijer([a], [], [b + 2, a], []) + assert can_do_meijer([a], [], [b - 2, a], []) + + assert hyperexpand(meijerg([a], [], [a, a, a - S.Half], [], z)) == \ + -sqrt(pi)*z**(a - S.Half)*(2*cos(2*sqrt(z))*(Si(2*sqrt(z)) - pi/2) + - 2*sin(2*sqrt(z))*Ci(2*sqrt(z))) == \ + hyperexpand(meijerg([a], [], [a, a - S.Half, a], [], z)) == \ + hyperexpand(meijerg([a], [], [a - S.Half, a, a], [], z)) + assert can_do_meijer([a - 1], [], [a + 2, a - Rational(3, 2), a + 1], []) + + +@XFAIL +def test_meijerg_expand_fail(): + # These basically test hyper([], [1/2 - a, 1/2 + 1, 1/2], z), + # which is *very* messy. But since the meijer g actually yields a + # sum of bessel functions, things can sometimes be simplified a lot and + # are then put into tables... + assert can_do_meijer([], [], [a + S.Half], [a, a - b/2, a + b/2]) + assert can_do_meijer([], [], [0, S.Half], [a, -a]) + assert can_do_meijer([], [], [3*a - S.Half, a, -a - S.Half], [a - S.Half]) + assert can_do_meijer([], [], [0, a - S.Half, -a - S.Half], [S.Half]) + assert can_do_meijer([], [], [a, b + S.Half, b], [2*b - a]) + assert can_do_meijer([], [], [a, b + S.Half, b, 2*b - a]) + assert can_do_meijer([S.Half], [], [-a, a], [0]) + + +@slow +def test_meijerg(): + # carefully set up the parameters. + # NOTE: this used to fail sometimes. I believe it is fixed, but if you + # hit an inexplicable test failure here, please let me know the seed. + a1, a2 = (randcplx(n) - 5*I - n*I for n in range(2)) + b1, b2 = (randcplx(n) + 5*I + n*I for n in range(2)) + b3, b4, b5, a3, a4, a5 = (randcplx() for n in range(6)) + g = meijerg([a1], [a3, a4], [b1], [b3, b4], z) + + assert ReduceOrder.meijer_minus(3, 4) is None + assert ReduceOrder.meijer_plus(4, 3) is None + + g2 = meijerg([a1, a2], [a3, a4], [b1], [b3, b4, a2], z) + assert tn(ReduceOrder.meijer_plus(a2, a2).apply(g, op), g2, z) + + g2 = meijerg([a1, a2], [a3, a4], [b1], [b3, b4, a2 + 1], z) + assert tn(ReduceOrder.meijer_plus(a2, a2 + 1).apply(g, op), g2, z) + + g2 = meijerg([a1, a2 - 1], [a3, a4], [b1], [b3, b4, a2 + 2], z) + assert tn(ReduceOrder.meijer_plus(a2 - 1, a2 + 2).apply(g, op), g2, z) + + g2 = meijerg([a1], [a3, a4, b2 - 1], [b1, b2 + 2], [b3, b4], z) + assert tn(ReduceOrder.meijer_minus( + b2 + 2, b2 - 1).apply(g, op), g2, z, tol=1e-6) + + # test several-step reduction + an = [a1, a2] + bq = [b3, b4, a2 + 1] + ap = [a3, a4, b2 - 1] + bm = [b1, b2 + 1] + niq, ops = reduce_order_meijer(G_Function(an, ap, bm, bq)) + assert niq.an == (a1,) + assert set(niq.ap) == {a3, a4} + assert niq.bm == (b1,) + assert set(niq.bq) == {b3, b4} + assert tn(apply_operators(g, ops, op), meijerg(an, ap, bm, bq, z), z) + + +def test_meijerg_shift_operators(): + # carefully set up the parameters. XXX this still fails sometimes + a1, a2, a3, a4, a5, b1, b2, b3, b4, b5 = (randcplx(n) for n in range(10)) + g = meijerg([a1], [a3, a4], [b1], [b3, b4], z) + + assert tn(MeijerShiftA(b1).apply(g, op), + meijerg([a1], [a3, a4], [b1 + 1], [b3, b4], z), z) + assert tn(MeijerShiftB(a1).apply(g, op), + meijerg([a1 - 1], [a3, a4], [b1], [b3, b4], z), z) + assert tn(MeijerShiftC(b3).apply(g, op), + meijerg([a1], [a3, a4], [b1], [b3 + 1, b4], z), z) + assert tn(MeijerShiftD(a3).apply(g, op), + meijerg([a1], [a3 - 1, a4], [b1], [b3, b4], z), z) + + s = MeijerUnShiftA([a1], [a3, a4], [b1], [b3, b4], 0, z) + assert tn( + s.apply(g, op), meijerg([a1], [a3, a4], [b1 - 1], [b3, b4], z), z) + + s = MeijerUnShiftC([a1], [a3, a4], [b1], [b3, b4], 0, z) + assert tn( + s.apply(g, op), meijerg([a1], [a3, a4], [b1], [b3 - 1, b4], z), z) + + s = MeijerUnShiftB([a1], [a3, a4], [b1], [b3, b4], 0, z) + assert tn( + s.apply(g, op), meijerg([a1 + 1], [a3, a4], [b1], [b3, b4], z), z) + + s = MeijerUnShiftD([a1], [a3, a4], [b1], [b3, b4], 0, z) + assert tn( + s.apply(g, op), meijerg([a1], [a3 + 1, a4], [b1], [b3, b4], z), z) + + +@slow +def test_meijerg_confluence(): + def t(m, a, b): + from sympy.core.sympify import sympify + a, b = sympify([a, b]) + m_ = m + m = hyperexpand(m) + if not m == Piecewise((a, abs(z) < 1), (b, abs(1/z) < 1), (m_, True)): + return False + if not (m.args[0].args[0] == a and m.args[1].args[0] == b): + return False + z0 = randcplx()/10 + if abs(m.subs(z, z0).n() - a.subs(z, z0).n()).n() > 1e-10: + return False + if abs(m.subs(z, 1/z0).n() - b.subs(z, 1/z0).n()).n() > 1e-10: + return False + return True + + assert t(meijerg([], [1, 1], [0, 0], [], z), -log(z), 0) + assert t(meijerg( + [], [3, 1], [0, 0], [], z), -z**2/4 + z - log(z)/2 - Rational(3, 4), 0) + assert t(meijerg([], [3, 1], [-1, 0], [], z), + z**2/12 - z/2 + log(z)/2 + Rational(1, 4) + 1/(6*z), 0) + assert t(meijerg([], [1, 1, 1, 1], [0, 0, 0, 0], [], z), -log(z)**3/6, 0) + assert t(meijerg([1, 1], [], [], [0, 0], z), 0, -log(1/z)) + assert t(meijerg([1, 1], [2, 2], [1, 1], [0, 0], z), + -z*log(z) + 2*z, -log(1/z) + 2) + assert t(meijerg([S.Half], [1, 1], [0, 0], [Rational(3, 2)], z), log(z)/2 - 1, 0) + + def u(an, ap, bm, bq): + m = meijerg(an, ap, bm, bq, z) + m2 = hyperexpand(m, allow_hyper=True) + if m2.has(meijerg) and not (m2.is_Piecewise and len(m2.args) == 3): + return False + return tn(m, m2, z) + assert u([], [1], [0, 0], []) + assert u([1, 1], [], [], [0]) + assert u([1, 1], [2, 2, 5], [1, 1, 6], [0, 0]) + assert u([1, 1], [2, 2, 5], [1, 1, 6], [0]) + + +def test_meijerg_with_Floats(): + # see issue #10681 + from sympy.polys.domains.realfield import RR + f = meijerg(((3.0, 1), ()), ((Rational(3, 2),), (0,)), z) + a = -2.3632718012073 + g = a*z**Rational(3, 2)*hyper((-0.5, Rational(3, 2)), (Rational(5, 2),), z*exp_polar(I*pi)) + assert RR.almosteq((hyperexpand(f)/g).n(), 1.0, 1e-12) + + +def test_lerchphi(): + from sympy.functions.special.zeta_functions import (lerchphi, polylog) + from sympy.simplify.gammasimp import gammasimp + assert hyperexpand(hyper([1, a], [a + 1], z)/a) == lerchphi(z, 1, a) + assert hyperexpand( + hyper([1, a, a], [a + 1, a + 1], z)/a**2) == lerchphi(z, 2, a) + assert hyperexpand(hyper([1, a, a, a], [a + 1, a + 1, a + 1], z)/a**3) == \ + lerchphi(z, 3, a) + assert hyperexpand(hyper([1] + [a]*10, [a + 1]*10, z)/a**10) == \ + lerchphi(z, 10, a) + assert gammasimp(hyperexpand(meijerg([0, 1 - a], [], [0], + [-a], exp_polar(-I*pi)*z))) == lerchphi(z, 1, a) + assert gammasimp(hyperexpand(meijerg([0, 1 - a, 1 - a], [], [0], + [-a, -a], exp_polar(-I*pi)*z))) == lerchphi(z, 2, a) + assert gammasimp(hyperexpand(meijerg([0, 1 - a, 1 - a, 1 - a], [], [0], + [-a, -a, -a], exp_polar(-I*pi)*z))) == lerchphi(z, 3, a) + + assert hyperexpand(z*hyper([1, 1], [2], z)) == -log(1 + -z) + assert hyperexpand(z*hyper([1, 1, 1], [2, 2], z)) == polylog(2, z) + assert hyperexpand(z*hyper([1, 1, 1, 1], [2, 2, 2], z)) == polylog(3, z) + + assert hyperexpand(hyper([1, a, 1 + S.Half], [a + 1, S.Half], z)) == \ + -2*a/(z - 1) + (-2*a**2 + a)*lerchphi(z, 1, a) + + # Now numerical tests. These make sure reductions etc are carried out + # correctly + + # a rational function (polylog at negative integer order) + assert can_do([2, 2, 2], [1, 1]) + + # NOTE these contain log(1-x) etc ... better make sure we have |z| < 1 + # reduction of order for polylog + assert can_do([1, 1, 1, b + 5], [2, 2, b], div=10) + + # reduction of order for lerchphi + # XXX lerchphi in mpmath is flaky + assert can_do( + [1, a, a, a, b + 5], [a + 1, a + 1, a + 1, b], numerical=False) + + # test a bug + from sympy.functions.elementary.complexes import Abs + assert hyperexpand(hyper([S.Half, S.Half, S.Half, 1], + [Rational(3, 2), Rational(3, 2), Rational(3, 2)], Rational(1, 4))) == \ + Abs(-polylog(3, exp_polar(I*pi)/2) + polylog(3, S.Half)) + + +def test_partial_simp(): + # First test that hypergeometric function formulae work. + a, b, c, d, e = (randcplx() for _ in range(5)) + for func in [Hyper_Function([a, b, c], [d, e]), + Hyper_Function([], [a, b, c, d, e])]: + f = build_hypergeometric_formula(func) + z = f.z + assert f.closed_form == func(z) + deriv1 = f.B.diff(z)*z + deriv2 = f.M*f.B + for func1, func2 in zip(deriv1, deriv2): + assert tn(func1, func2, z) + + # Now test that formulae are partially simplified. + a, b, z = symbols('a b z') + assert hyperexpand(hyper([3, a], [1, b], z)) == \ + (-a*b/2 + a*z/2 + 2*a)*hyper([a + 1], [b], z) \ + + (a*b/2 - 2*a + 1)*hyper([a], [b], z) + assert tn( + hyperexpand(hyper([3, d], [1, e], z)), hyper([3, d], [1, e], z), z) + assert hyperexpand(hyper([3], [1, a, b], z)) == \ + hyper((), (a, b), z) \ + + z*hyper((), (a + 1, b), z)/(2*a) \ + - z*(b - 4)*hyper((), (a + 1, b + 1), z)/(2*a*b) + assert tn( + hyperexpand(hyper([3], [1, d, e], z)), hyper([3], [1, d, e], z), z) + + +def test_hyperexpand_special(): + assert hyperexpand(hyper([a, b], [c], 1)) == \ + gamma(c)*gamma(c - a - b)/gamma(c - a)/gamma(c - b) + assert hyperexpand(hyper([a, b], [1 + a - b], -1)) == \ + gamma(1 + a/2)*gamma(1 + a - b)/gamma(1 + a)/gamma(1 + a/2 - b) + assert hyperexpand(hyper([a, b], [1 + b - a], -1)) == \ + gamma(1 + b/2)*gamma(1 + b - a)/gamma(1 + b)/gamma(1 + b/2 - a) + assert hyperexpand(meijerg([1 - z - a/2], [1 - z + a/2], [b/2], [-b/2], 1)) == \ + gamma(1 - 2*z)*gamma(z + a/2 + b/2)/gamma(1 - z + a/2 - b/2) \ + /gamma(1 - z - a/2 + b/2)/gamma(1 - z + a/2 + b/2) + assert hyperexpand(hyper([a], [b], 0)) == 1 + assert hyper([a], [b], 0) != 0 + + +def test_Mod1_behavior(): + from sympy.core.symbol import Symbol + from sympy.simplify.simplify import simplify + n = Symbol('n', integer=True) + # Note: this should not hang. + assert simplify(hyperexpand(meijerg([1], [], [n + 1], [0], z))) == \ + lowergamma(n + 1, z) + + +@slow +def test_prudnikov_misc(): + assert can_do([1, (3 + I)/2, (3 - I)/2], [Rational(3, 2), 2]) + assert can_do([S.Half, a - 1], [Rational(3, 2), a + 1], lowerplane=True) + assert can_do([], [b + 1]) + assert can_do([a], [a - 1, b + 1]) + + assert can_do([a], [a - S.Half, 2*a]) + assert can_do([a], [a - S.Half, 2*a + 1]) + assert can_do([a], [a - S.Half, 2*a - 1]) + assert can_do([a], [a + S.Half, 2*a]) + assert can_do([a], [a + S.Half, 2*a + 1]) + assert can_do([a], [a + S.Half, 2*a - 1]) + assert can_do([S.Half], [b, 2 - b]) + assert can_do([S.Half], [b, 3 - b]) + assert can_do([1], [2, b]) + + assert can_do([a, a + S.Half], [2*a, b, 2*a - b + 1]) + assert can_do([a, a + S.Half], [S.Half, 2*a, 2*a + S.Half]) + assert can_do([a], [a + 1], lowerplane=True) # lowergamma + + +def test_prudnikov_1(): + # A. P. Prudnikov, Yu. A. Brychkov and O. I. Marichev (1990). + # Integrals and Series: More Special Functions, Vol. 3,. + # Gordon and Breach Science Publisher + + # 7.3.1 + assert can_do([a, -a], [S.Half]) + assert can_do([a, 1 - a], [S.Half]) + assert can_do([a, 1 - a], [Rational(3, 2)]) + assert can_do([a, 2 - a], [S.Half]) + assert can_do([a, 2 - a], [Rational(3, 2)]) + assert can_do([a, 2 - a], [Rational(3, 2)]) + assert can_do([a, a + S.Half], [2*a - 1]) + assert can_do([a, a + S.Half], [2*a]) + assert can_do([a, a + S.Half], [2*a + 1]) + assert can_do([a, a + S.Half], [S.Half]) + assert can_do([a, a + S.Half], [Rational(3, 2)]) + assert can_do([a, a/2 + 1], [a/2]) + assert can_do([1, b], [2]) + assert can_do([1, b], [b + 1], numerical=False) # Lerch Phi + # NOTE: branches are complicated for |z| > 1 + + assert can_do([a], [2*a]) + assert can_do([a], [2*a + 1]) + assert can_do([a], [2*a - 1]) + + +@slow +def test_prudnikov_2(): + h = S.Half + assert can_do([-h, -h], [h]) + assert can_do([-h, h], [3*h]) + assert can_do([-h, h], [5*h]) + assert can_do([-h, h], [7*h]) + assert can_do([-h, 1], [h]) + + for p in [-h, h]: + for n in [-h, h, 1, 3*h, 2, 5*h, 3, 7*h, 4]: + for m in [-h, h, 3*h, 5*h, 7*h]: + assert can_do([p, n], [m]) + for n in [1, 2, 3, 4]: + for m in [1, 2, 3, 4]: + assert can_do([p, n], [m]) + + +def test_prudnikov_3(): + h = S.Half + assert can_do([Rational(1, 4), Rational(3, 4)], [h]) + assert can_do([Rational(1, 4), Rational(3, 4)], [3*h]) + assert can_do([Rational(1, 3), Rational(2, 3)], [3*h]) + assert can_do([Rational(3, 4), Rational(5, 4)], [h]) + assert can_do([Rational(3, 4), Rational(5, 4)], [3*h]) + + +@tooslow +def test_prudnikov_3_slow(): + # XXX: This is marked as tooslow and hence skipped in CI. None of the + # individual cases below fails or hangs. Some cases are slow and the loops + # below generate 280 different cases. Is it really necessary to test all + # 280 cases here? + h = S.Half + for p in [1, 2, 3, 4]: + for n in [-h, h, 1, 3*h, 2, 5*h, 3, 7*h, 4, 9*h]: + for m in [1, 3*h, 2, 5*h, 3, 7*h, 4]: + assert can_do([p, m], [n]) + + +@slow +def test_prudnikov_4(): + h = S.Half + for p in [3*h, 5*h, 7*h]: + for n in [-h, h, 3*h, 5*h, 7*h]: + for m in [3*h, 2, 5*h, 3, 7*h, 4]: + assert can_do([p, m], [n]) + for n in [1, 2, 3, 4]: + for m in [2, 3, 4]: + assert can_do([p, m], [n]) + + +@slow +def test_prudnikov_5(): + h = S.Half + + for p in [1, 2, 3]: + for q in range(p, 4): + for r in [1, 2, 3]: + for s in range(r, 4): + assert can_do([-h, p, q], [r, s]) + + for p in [h, 1, 3*h, 2, 5*h, 3]: + for q in [h, 3*h, 5*h]: + for r in [h, 3*h, 5*h]: + for s in [h, 3*h, 5*h]: + if s <= q and s <= r: + assert can_do([-h, p, q], [r, s]) + + for p in [h, 1, 3*h, 2, 5*h, 3]: + for q in [1, 2, 3]: + for r in [h, 3*h, 5*h]: + for s in [1, 2, 3]: + assert can_do([-h, p, q], [r, s]) + + +@slow +def test_prudnikov_6(): + h = S.Half + + for m in [3*h, 5*h]: + for n in [1, 2, 3]: + for q in [h, 1, 2]: + for p in [1, 2, 3]: + assert can_do([h, q, p], [m, n]) + for q in [1, 2, 3]: + for p in [3*h, 5*h]: + assert can_do([h, q, p], [m, n]) + + for q in [1, 2]: + for p in [1, 2, 3]: + for m in [1, 2, 3]: + for n in [1, 2, 3]: + assert can_do([h, q, p], [m, n]) + + assert can_do([h, h, 5*h], [3*h, 3*h]) + assert can_do([h, 1, 5*h], [3*h, 3*h]) + assert can_do([h, 2, 2], [1, 3]) + + # pages 435 to 457 contain more PFDD and stuff like this + + +@slow +def test_prudnikov_7(): + assert can_do([3], [6]) + + h = S.Half + for n in [h, 3*h, 5*h, 7*h]: + assert can_do([-h], [n]) + for m in [-h, h, 1, 3*h, 2, 5*h, 3, 7*h, 4]: # HERE + for n in [-h, h, 3*h, 5*h, 7*h, 1, 2, 3, 4]: + assert can_do([m], [n]) + + +@slow +def test_prudnikov_8(): + h = S.Half + + # 7.12.2 + for ai in [1, 2, 3]: + for bi in [1, 2, 3]: + for ci in range(1, ai + 1): + for di in [h, 1, 3*h, 2, 5*h, 3]: + assert can_do([ai, bi], [ci, di]) + for bi in [3*h, 5*h]: + for ci in [h, 1, 3*h, 2, 5*h, 3]: + for di in [1, 2, 3]: + assert can_do([ai, bi], [ci, di]) + + for ai in [-h, h, 3*h, 5*h]: + for bi in [1, 2, 3]: + for ci in [h, 1, 3*h, 2, 5*h, 3]: + for di in [1, 2, 3]: + assert can_do([ai, bi], [ci, di]) + for bi in [h, 3*h, 5*h]: + for ci in [h, 3*h, 5*h, 3]: + for di in [h, 1, 3*h, 2, 5*h, 3]: + if ci <= bi: + assert can_do([ai, bi], [ci, di]) + + +def test_prudnikov_9(): + # 7.13.1 [we have a general formula ... so this is a bit pointless] + for i in range(9): + assert can_do([], [(S(i) + 1)/2]) + for i in range(5): + assert can_do([], [-(2*S(i) + 1)/2]) + + +@slow +def test_prudnikov_10(): + # 7.14.2 + h = S.Half + for p in [-h, h, 1, 3*h, 2, 5*h, 3, 7*h, 4]: + for m in [1, 2, 3, 4]: + for n in range(m, 5): + assert can_do([p], [m, n]) + + for p in [1, 2, 3, 4]: + for n in [h, 3*h, 5*h, 7*h]: + for m in [1, 2, 3, 4]: + assert can_do([p], [n, m]) + + for p in [3*h, 5*h, 7*h]: + for m in [h, 1, 2, 5*h, 3, 7*h, 4]: + assert can_do([p], [h, m]) + assert can_do([p], [3*h, m]) + + for m in [h, 1, 2, 5*h, 3, 7*h, 4]: + assert can_do([7*h], [5*h, m]) + + assert can_do([Rational(-1, 2)], [S.Half, S.Half]) # shine-integral shi + + +def test_prudnikov_11(): + # 7.15 + assert can_do([a, a + S.Half], [2*a, b, 2*a - b]) + assert can_do([a, a + S.Half], [Rational(3, 2), 2*a, 2*a - S.Half]) + + assert can_do([Rational(1, 4), Rational(3, 4)], [S.Half, S.Half, 1]) + assert can_do([Rational(5, 4), Rational(3, 4)], [Rational(3, 2), S.Half, 2]) + assert can_do([Rational(5, 4), Rational(3, 4)], [Rational(3, 2), Rational(3, 2), 1]) + assert can_do([Rational(5, 4), Rational(7, 4)], [Rational(3, 2), Rational(5, 2), 2]) + + assert can_do([1, 1], [Rational(3, 2), 2, 2]) # cosh-integral chi + + +def test_prudnikov_12(): + # 7.16 + assert can_do( + [], [a, a + S.Half, 2*a], False) # branches only agree for some z! + assert can_do([], [a, a + S.Half, 2*a + 1], False) # dito + assert can_do([], [S.Half, a, a + S.Half]) + assert can_do([], [Rational(3, 2), a, a + S.Half]) + + assert can_do([], [Rational(1, 4), S.Half, Rational(3, 4)]) + assert can_do([], [S.Half, S.Half, 1]) + assert can_do([], [S.Half, Rational(3, 2), 1]) + assert can_do([], [Rational(3, 4), Rational(3, 2), Rational(5, 4)]) + assert can_do([], [1, 1, Rational(3, 2)]) + assert can_do([], [1, 2, Rational(3, 2)]) + assert can_do([], [1, Rational(3, 2), Rational(3, 2)]) + assert can_do([], [Rational(5, 4), Rational(3, 2), Rational(7, 4)]) + assert can_do([], [2, Rational(3, 2), Rational(3, 2)]) + + +@slow +def test_prudnikov_2F1(): + h = S.Half + # Elliptic integrals + for p in [-h, h]: + for m in [h, 3*h, 5*h, 7*h]: + for n in [1, 2, 3, 4]: + assert can_do([p, m], [n]) + + +@XFAIL +def test_prudnikov_fail_2F1(): + assert can_do([a, b], [b + 1]) # incomplete beta function + assert can_do([-1, b], [c]) # Poly. also -2, -3 etc + + # TODO polys + + # Legendre functions: + assert can_do([a, b], [a + b + S.Half]) + assert can_do([a, b], [a + b - S.Half]) + assert can_do([a, b], [a + b + Rational(3, 2)]) + assert can_do([a, b], [(a + b + 1)/2]) + assert can_do([a, b], [(a + b)/2 + 1]) + assert can_do([a, b], [a - b + 1]) + assert can_do([a, b], [a - b + 2]) + assert can_do([a, b], [2*b]) + assert can_do([a, b], [S.Half]) + assert can_do([a, b], [Rational(3, 2)]) + assert can_do([a, 1 - a], [c]) + assert can_do([a, 2 - a], [c]) + assert can_do([a, 3 - a], [c]) + assert can_do([a, a + S.Half], [c]) + assert can_do([1, b], [c]) + assert can_do([1, b], [Rational(3, 2)]) + + assert can_do([Rational(1, 4), Rational(3, 4)], [1]) + + # PFDD + o = S.One + assert can_do([o/8, 1], [o/8*9]) + assert can_do([o/6, 1], [o/6*7]) + assert can_do([o/6, 1], [o/6*13]) + assert can_do([o/5, 1], [o/5*6]) + assert can_do([o/5, 1], [o/5*11]) + assert can_do([o/4, 1], [o/4*5]) + assert can_do([o/4, 1], [o/4*9]) + assert can_do([o/3, 1], [o/3*4]) + assert can_do([o/3, 1], [o/3*7]) + assert can_do([o/8*3, 1], [o/8*11]) + assert can_do([o/5*2, 1], [o/5*7]) + assert can_do([o/5*2, 1], [o/5*12]) + assert can_do([o/5*3, 1], [o/5*8]) + assert can_do([o/5*3, 1], [o/5*13]) + assert can_do([o/8*5, 1], [o/8*13]) + assert can_do([o/4*3, 1], [o/4*7]) + assert can_do([o/4*3, 1], [o/4*11]) + assert can_do([o/3*2, 1], [o/3*5]) + assert can_do([o/3*2, 1], [o/3*8]) + assert can_do([o/5*4, 1], [o/5*9]) + assert can_do([o/5*4, 1], [o/5*14]) + assert can_do([o/6*5, 1], [o/6*11]) + assert can_do([o/6*5, 1], [o/6*17]) + assert can_do([o/8*7, 1], [o/8*15]) + + +@XFAIL +def test_prudnikov_fail_3F2(): + assert can_do([a, a + Rational(1, 3), a + Rational(2, 3)], [Rational(1, 3), Rational(2, 3)]) + assert can_do([a, a + Rational(1, 3), a + Rational(2, 3)], [Rational(2, 3), Rational(4, 3)]) + assert can_do([a, a + Rational(1, 3), a + Rational(2, 3)], [Rational(4, 3), Rational(5, 3)]) + + # page 421 + assert can_do([a, a + Rational(1, 3), a + Rational(2, 3)], [a*Rational(3, 2), (3*a + 1)/2]) + + # pages 422 ... + assert can_do([Rational(-1, 2), S.Half, S.Half], [1, 1]) # elliptic integrals + assert can_do([Rational(-1, 2), S.Half, 1], [Rational(3, 2), Rational(3, 2)]) + # TODO LOTS more + + # PFDD + assert can_do([Rational(1, 8), Rational(3, 8), 1], [Rational(9, 8), Rational(11, 8)]) + assert can_do([Rational(1, 8), Rational(5, 8), 1], [Rational(9, 8), Rational(13, 8)]) + assert can_do([Rational(1, 8), Rational(7, 8), 1], [Rational(9, 8), Rational(15, 8)]) + assert can_do([Rational(1, 6), Rational(1, 3), 1], [Rational(7, 6), Rational(4, 3)]) + assert can_do([Rational(1, 6), Rational(2, 3), 1], [Rational(7, 6), Rational(5, 3)]) + assert can_do([Rational(1, 6), Rational(2, 3), 1], [Rational(5, 3), Rational(13, 6)]) + assert can_do([S.Half, 1, 1], [Rational(1, 4), Rational(3, 4)]) + # LOTS more + + +@XFAIL +def test_prudnikov_fail_other(): + # 7.11.2 + + # 7.12.1 + assert can_do([1, a], [b, 1 - 2*a + b]) # ??? + + # 7.14.2 + assert can_do([Rational(-1, 2)], [S.Half, 1]) # struve + assert can_do([1], [S.Half, S.Half]) # struve + assert can_do([Rational(1, 4)], [S.Half, Rational(5, 4)]) # PFDD + assert can_do([Rational(3, 4)], [Rational(3, 2), Rational(7, 4)]) # PFDD + assert can_do([1], [Rational(1, 4), Rational(3, 4)]) # PFDD + assert can_do([1], [Rational(3, 4), Rational(5, 4)]) # PFDD + assert can_do([1], [Rational(5, 4), Rational(7, 4)]) # PFDD + # TODO LOTS more + + # 7.15.2 + assert can_do([S.Half, 1], [Rational(3, 4), Rational(5, 4), Rational(3, 2)]) # PFDD + assert can_do([S.Half, 1], [Rational(7, 4), Rational(5, 4), Rational(3, 2)]) # PFDD + + # 7.16.1 + assert can_do([], [Rational(1, 3), S(2/3)]) # PFDD + assert can_do([], [Rational(2, 3), S(4/3)]) # PFDD + assert can_do([], [Rational(5, 3), S(4/3)]) # PFDD + + # XXX this does not *evaluate* right?? + assert can_do([], [a, a + S.Half, 2*a - 1]) + + +def test_bug(): + h = hyper([-1, 1], [z], -1) + assert hyperexpand(h) == (z + 1)/z + + +def test_omgissue_203(): + h = hyper((-5, -3, -4), (-6, -6), 1) + assert hyperexpand(h) == Rational(1, 30) + h = hyper((-6, -7, -5), (-6, -6), 1) + assert hyperexpand(h) == Rational(-1, 6) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_powsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_powsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..61bdc93d052baf4b1e80da8f5864cf22b8fa383e --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_powsimp.py @@ -0,0 +1,368 @@ +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (E, I, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import sin +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import hyper +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.simplify.powsimp import (powdenest, powsimp) +from sympy.simplify.simplify import (signsimp, simplify) +from sympy.core.symbol import Str + +from sympy.abc import x, y, z, a, b + + +def test_powsimp(): + x, y, z, n = symbols('x,y,z,n') + f = Function('f') + assert powsimp( 4**x * 2**(-x) * 2**(-x) ) == 1 + assert powsimp( (-4)**x * (-2)**(-x) * 2**(-x) ) == 1 + + assert powsimp( + f(4**x * 2**(-x) * 2**(-x)) ) == f(4**x * 2**(-x) * 2**(-x)) + assert powsimp( f(4**x * 2**(-x) * 2**(-x)), deep=True ) == f(1) + assert exp(x)*exp(y) == exp(x)*exp(y) + assert powsimp(exp(x)*exp(y)) == exp(x + y) + assert powsimp(exp(x)*exp(y)*2**x*2**y) == (2*E)**(x + y) + assert powsimp(exp(x)*exp(y)*2**x*2**y, combine='exp') == \ + exp(x + y)*2**(x + y) + assert powsimp(exp(x)*exp(y)*exp(2)*sin(x) + sin(y) + 2**x*2**y) == \ + exp(2 + x + y)*sin(x) + sin(y) + 2**(x + y) + assert powsimp(sin(exp(x)*exp(y))) == sin(exp(x)*exp(y)) + assert powsimp(sin(exp(x)*exp(y)), deep=True) == sin(exp(x + y)) + assert powsimp(x**2*x**y) == x**(2 + y) + # This should remain factored, because 'exp' with deep=True is supposed + # to act like old automatic exponent combining. + assert powsimp((1 + E*exp(E))*exp(-E), combine='exp', deep=True) == \ + (1 + exp(1 + E))*exp(-E) + assert powsimp((1 + E*exp(E))*exp(-E), deep=True) == \ + (1 + exp(1 + E))*exp(-E) + assert powsimp((1 + E*exp(E))*exp(-E)) == (1 + exp(1 + E))*exp(-E) + assert powsimp((1 + E*exp(E))*exp(-E), combine='exp') == \ + (1 + exp(1 + E))*exp(-E) + assert powsimp((1 + E*exp(E))*exp(-E), combine='base') == \ + (1 + E*exp(E))*exp(-E) + x, y = symbols('x,y', nonnegative=True) + n = Symbol('n', real=True) + assert powsimp(y**n * (y/x)**(-n)) == x**n + assert powsimp(x**(x**(x*y)*y**(x*y))*y**(x**(x*y)*y**(x*y)), deep=True) \ + == (x*y)**(x*y)**(x*y) + assert powsimp(2**(2**(2*x)*x), deep=False) == 2**(2**(2*x)*x) + assert powsimp(2**(2**(2*x)*x), deep=True) == 2**(x*4**x) + assert powsimp( + exp(-x + exp(-x)*exp(-x*log(x))), deep=False, combine='exp') == \ + exp(-x + exp(-x)*exp(-x*log(x))) + assert powsimp( + exp(-x + exp(-x)*exp(-x*log(x))), deep=False, combine='exp') == \ + exp(-x + exp(-x)*exp(-x*log(x))) + assert powsimp((x + y)/(3*z), deep=False, combine='exp') == (x + y)/(3*z) + assert powsimp((x/3 + y/3)/z, deep=True, combine='exp') == (x/3 + y/3)/z + assert powsimp(exp(x)/(1 + exp(x)*exp(y)), deep=True) == \ + exp(x)/(1 + exp(x + y)) + assert powsimp(x*y**(z**x*z**y), deep=True) == x*y**(z**(x + y)) + assert powsimp((z**x*z**y)**x, deep=True) == (z**(x + y))**x + assert powsimp(x*(z**x*z**y)**x, deep=True) == x*(z**(x + y))**x + p = symbols('p', positive=True) + assert powsimp((1/x)**log(2)/x) == (1/x)**(1 + log(2)) + assert powsimp((1/p)**log(2)/p) == p**(-1 - log(2)) + + # coefficient of exponent can only be simplified for positive bases + assert powsimp(2**(2*x)) == 4**x + assert powsimp((-1)**(2*x)) == (-1)**(2*x) + i = symbols('i', integer=True) + assert powsimp((-1)**(2*i)) == 1 + assert powsimp((-1)**(-x)) != (-1)**x # could be 1/((-1)**x), but is not + # force=True overrides assumptions + assert powsimp((-1)**(2*x), force=True) == 1 + + # rational exponents allow combining of negative terms + w, n, m = symbols('w n m', negative=True) + e = i/a # not a rational exponent if `a` is unknown + ex = w**e*n**e*m**e + assert powsimp(ex) == m**(i/a)*n**(i/a)*w**(i/a) + e = i/3 + ex = w**e*n**e*m**e + assert powsimp(ex) == (-1)**i*(-m*n*w)**(i/3) + e = (3 + i)/i + ex = w**e*n**e*m**e + assert powsimp(ex) == (-1)**(3*e)*(-m*n*w)**e + + eq = x**(a*Rational(2, 3)) + # eq != (x**a)**(2/3) (try x = -1 and a = 3 to see) + assert powsimp(eq).exp == eq.exp == a*Rational(2, 3) + # powdenest goes the other direction + assert powsimp(2**(2*x)) == 4**x + + assert powsimp(exp(p/2)) == exp(p/2) + + # issue 6368 + eq = Mul(*[sqrt(Dummy(imaginary=True)) for i in range(3)]) + assert powsimp(eq) == eq and eq.is_Mul + + assert all(powsimp(e) == e for e in (sqrt(x**a), sqrt(x**2))) + + # issue 8836 + assert str( powsimp(exp(I*pi/3)*root(-1,3)) ) == '(-1)**(2/3)' + + # issue 9183 + assert powsimp(-0.1**x) == -0.1**x + + # issue 10095 + assert powsimp((1/(2*E))**oo) == (exp(-1)/2)**oo + + # PR 13131 + eq = sin(2*x)**2*sin(2.0*x)**2 + assert powsimp(eq) == eq + + # issue 14615 + assert powsimp(x**2*y**3*(x*y**2)**Rational(3, 2) + ) == x*y*(x*y**2)**Rational(5, 2) + + #issue 27380 + assert powsimp(1.0**(x+1)/1.0**x) == 1.0 + +def test_powsimp_negated_base(): + assert powsimp((-x + y)/sqrt(x - y)) == -sqrt(x - y) + assert powsimp((-x + y)*(-z + y)/sqrt(x - y)/sqrt(z - y)) == sqrt(x - y)*sqrt(z - y) + p = symbols('p', positive=True) + reps = {p: 2, a: S.Half} + assert powsimp((-p)**a/p**a).subs(reps) == ((-1)**a).subs(reps) + assert powsimp((-p)**a*p**a).subs(reps) == ((-p**2)**a).subs(reps) + n = symbols('n', negative=True) + reps = {p: -2, a: S.Half} + assert powsimp((-n)**a/n**a).subs(reps) == (-1)**(-a).subs(a, S.Half) + assert powsimp((-n)**a*n**a).subs(reps) == ((-n**2)**a).subs(reps) + # if x is 0 then the lhs is 0**a*oo**a which is not (-1)**a + eq = (-x)**a/x**a + assert powsimp(eq) == eq + + +def test_powsimp_nc(): + x, y, z = symbols('x,y,z') + A, B, C = symbols('A B C', commutative=False) + + assert powsimp(A**x*A**y, combine='all') == A**(x + y) + assert powsimp(A**x*A**y, combine='base') == A**x*A**y + assert powsimp(A**x*A**y, combine='exp') == A**(x + y) + + assert powsimp(A**x*B**x, combine='all') == A**x*B**x + assert powsimp(A**x*B**x, combine='base') == A**x*B**x + assert powsimp(A**x*B**x, combine='exp') == A**x*B**x + + assert powsimp(B**x*A**x, combine='all') == B**x*A**x + assert powsimp(B**x*A**x, combine='base') == B**x*A**x + assert powsimp(B**x*A**x, combine='exp') == B**x*A**x + + assert powsimp(A**x*A**y*A**z, combine='all') == A**(x + y + z) + assert powsimp(A**x*A**y*A**z, combine='base') == A**x*A**y*A**z + assert powsimp(A**x*A**y*A**z, combine='exp') == A**(x + y + z) + + assert powsimp(A**x*B**x*C**x, combine='all') == A**x*B**x*C**x + assert powsimp(A**x*B**x*C**x, combine='base') == A**x*B**x*C**x + assert powsimp(A**x*B**x*C**x, combine='exp') == A**x*B**x*C**x + + assert powsimp(B**x*A**x*C**x, combine='all') == B**x*A**x*C**x + assert powsimp(B**x*A**x*C**x, combine='base') == B**x*A**x*C**x + assert powsimp(B**x*A**x*C**x, combine='exp') == B**x*A**x*C**x + + +def test_issue_6440(): + assert powsimp(16*2**a*8**b) == 2**(a + 3*b + 4) + + +def test_powdenest(): + x, y = symbols('x,y') + p, q = symbols('p q', positive=True) + i, j = symbols('i,j', integer=True) + + assert powdenest(x) == x + assert powdenest(x + 2*(x**(a*Rational(2, 3)))**(3*x)) == (x + 2*(x**(a*Rational(2, 3)))**(3*x)) + assert powdenest((exp(a*Rational(2, 3)))**(3*x)) # -X-> (exp(a/3))**(6*x) + assert powdenest((x**(a*Rational(2, 3)))**(3*x)) == ((x**(a*Rational(2, 3)))**(3*x)) + assert powdenest(exp(3*x*log(2))) == 2**(3*x) + assert powdenest(sqrt(p**2)) == p + eq = p**(2*i)*q**(4*i) + assert powdenest(eq) == (p*q**2)**(2*i) + # -X-> (x**x)**i*(x**x)**j == x**(x*(i + j)) + assert powdenest((x**x)**(i + j)) + assert powdenest(exp(3*y*log(x))) == x**(3*y) + assert powdenest(exp(y*(log(a) + log(b)))) == (a*b)**y + assert powdenest(exp(3*(log(a) + log(b)))) == a**3*b**3 + assert powdenest(((x**(2*i))**(3*y))**x) == ((x**(2*i))**(3*y))**x + assert powdenest(((x**(2*i))**(3*y))**x, force=True) == x**(6*i*x*y) + assert powdenest(((x**(a*Rational(2, 3)))**(3*y/i))**x) == \ + (((x**(a*Rational(2, 3)))**(3*y/i))**x) + assert powdenest((x**(2*i)*y**(4*i))**z, force=True) == (x*y**2)**(2*i*z) + assert powdenest((p**(2*i)*q**(4*i))**j) == (p*q**2)**(2*i*j) + e = ((p**(2*a))**(3*y))**x + assert powdenest(e) == e + e = ((x**2*y**4)**a)**(x*y) + assert powdenest(e) == e + e = (((x**2*y**4)**a)**(x*y))**3 + assert powdenest(e) == ((x**2*y**4)**a)**(3*x*y) + assert powdenest((((x**2*y**4)**a)**(x*y)), force=True) == \ + (x*y**2)**(2*a*x*y) + assert powdenest((((x**2*y**4)**a)**(x*y))**3, force=True) == \ + (x*y**2)**(6*a*x*y) + assert powdenest((x**2*y**6)**i) != (x*y**3)**(2*i) + x, y = symbols('x,y', positive=True) + assert powdenest((x**2*y**6)**i) == (x*y**3)**(2*i) + + assert powdenest((x**(i*Rational(2, 3))*y**(i/2))**(2*i)) == (x**Rational(4, 3)*y)**(i**2) + assert powdenest(sqrt(x**(2*i)*y**(6*i))) == (x*y**3)**i + + assert powdenest(4**x) == 2**(2*x) + assert powdenest((4**x)**y) == 2**(2*x*y) + assert powdenest(4**x*y) == 2**(2*x)*y + + +def test_powdenest_polar(): + x, y, z = symbols('x y z', polar=True) + a, b, c = symbols('a b c') + assert powdenest((x*y*z)**a) == x**a*y**a*z**a + assert powdenest((x**a*y**b)**c) == x**(a*c)*y**(b*c) + assert powdenest(((x**a)**b*y**c)**c) == x**(a*b*c)*y**(c**2) + + +def test_issue_5805(): + arg = ((gamma(x)*hyper((), (), x))*pi)**2 + assert powdenest(arg) == (pi*gamma(x)*hyper((), (), x))**2 + assert arg.is_positive is None + + +def test_issue_9324_powsimp_on_matrix_symbol(): + M = MatrixSymbol('M', 10, 10) + expr = powsimp(M, deep=True) + assert expr == M + assert expr.args[0] == Str('M') + + +def test_issue_6367(): + z = -5*sqrt(2)/(2*sqrt(2*sqrt(29) + 29)) + sqrt(-sqrt(29)/29 + S.Half) + assert Mul(*[powsimp(a) for a in Mul.make_args(z.normal())]) == 0 + assert powsimp(z.normal()) == 0 + assert simplify(z) == 0 + assert powsimp(sqrt(2 + sqrt(3))*sqrt(2 - sqrt(3)) + 1) == 2 + assert powsimp(z) != 0 + + +def test_powsimp_polar(): + from sympy.functions.elementary.complexes import polar_lift + from sympy.functions.elementary.exponential import exp_polar + x, y, z = symbols('x y z') + p, q, r = symbols('p q r', polar=True) + + assert (polar_lift(-1))**(2*x) == exp_polar(2*pi*I*x) + assert powsimp(p**x * q**x) == (p*q)**x + assert p**x * (1/p)**x == 1 + assert (1/p)**x == p**(-x) + + assert exp_polar(x)*exp_polar(y) == exp_polar(x)*exp_polar(y) + assert powsimp(exp_polar(x)*exp_polar(y)) == exp_polar(x + y) + assert powsimp(exp_polar(x)*exp_polar(y)*p**x*p**y) == \ + (p*exp_polar(1))**(x + y) + assert powsimp(exp_polar(x)*exp_polar(y)*p**x*p**y, combine='exp') == \ + exp_polar(x + y)*p**(x + y) + assert powsimp( + exp_polar(x)*exp_polar(y)*exp_polar(2)*sin(x) + sin(y) + p**x*p**y) \ + == p**(x + y) + sin(x)*exp_polar(2 + x + y) + sin(y) + assert powsimp(sin(exp_polar(x)*exp_polar(y))) == \ + sin(exp_polar(x)*exp_polar(y)) + assert powsimp(sin(exp_polar(x)*exp_polar(y)), deep=True) == \ + sin(exp_polar(x + y)) + + +def test_issue_5728(): + b = x*sqrt(y) + a = sqrt(b) + c = sqrt(sqrt(x)*y) + assert powsimp(a*b) == sqrt(b)**3 + assert powsimp(a*b**2*sqrt(y)) == sqrt(y)*a**5 + assert powsimp(a*x**2*c**3*y) == c**3*a**5 + assert powsimp(a*x*c**3*y**2) == c**7*a + assert powsimp(x*c**3*y**2) == c**7 + assert powsimp(x*c**3*y) == x*y*c**3 + assert powsimp(sqrt(x)*c**3*y) == c**5 + assert powsimp(sqrt(x)*a**3*sqrt(y)) == sqrt(x)*sqrt(y)*a**3 + assert powsimp(Mul(sqrt(x)*c**3*sqrt(y), y, evaluate=False)) == \ + sqrt(x)*sqrt(y)**3*c**3 + assert powsimp(a**2*a*x**2*y) == a**7 + + # symbolic powers work, too + b = x**y*y + a = b*sqrt(b) + assert a.is_Mul is True + assert powsimp(a) == sqrt(b)**3 + + # as does exp + a = x*exp(y*Rational(2, 3)) + assert powsimp(a*sqrt(a)) == sqrt(a)**3 + assert powsimp(a**2*sqrt(a)) == sqrt(a)**5 + assert powsimp(a**2*sqrt(sqrt(a))) == sqrt(sqrt(a))**9 + + +def test_issue_from_PR1599(): + n1, n2, n3, n4 = symbols('n1 n2 n3 n4', negative=True) + assert (powsimp(sqrt(n1)*sqrt(n2)*sqrt(n3)) == + -I*sqrt(-n1)*sqrt(-n2)*sqrt(-n3)) + assert (powsimp(root(n1, 3)*root(n2, 3)*root(n3, 3)*root(n4, 3)) == + -(-1)**Rational(1, 3)* + (-n1)**Rational(1, 3)*(-n2)**Rational(1, 3)*(-n3)**Rational(1, 3)*(-n4)**Rational(1, 3)) + + +def test_issue_10195(): + a = Symbol('a', integer=True) + l = Symbol('l', even=True, nonzero=True) + n = Symbol('n', odd=True) + e_x = (-1)**(n/2 - S.Half) - (-1)**(n*Rational(3, 2) - S.Half) + assert powsimp((-1)**(l/2)) == I**l + assert powsimp((-1)**(n/2)) == I**n + assert powsimp((-1)**(n*Rational(3, 2))) == -I**n + assert powsimp(e_x) == (-1)**(n/2 - S.Half) + (-1)**(n*Rational(3, 2) + + S.Half) + assert powsimp((-1)**(a*Rational(3, 2))) == (-I)**a + +def test_issue_15709(): + assert powsimp(3**x*Rational(2, 3)) == 2*3**(x-1) + assert powsimp(2*3**x/3) == 2*3**(x-1) + + +def test_issue_11981(): + x, y = symbols('x y', commutative=False) + assert powsimp((x*y)**2 * (y*x)**2) == (x*y)**2 * (y*x)**2 + + +def test_issue_17524(): + a = symbols("a", real=True) + e = (-1 - a**2)*sqrt(1 + a**2) + assert signsimp(powsimp(e)) == signsimp(e) == -(a**2 + 1)**(S(3)/2) + + +def test_issue_19627(): + # if you use force the user must verify + assert powdenest(sqrt(sin(x)**2), force=True) == sin(x) + assert powdenest((x**(S.Half/y))**(2*y), force=True) == x + from sympy.core.function import expand_power_base + e = 1 - a + expr = (exp(z/e)*x**(b/e)*y**((1 - b)/e))**e + assert powdenest(expand_power_base(expr, force=True), force=True + ) == x**b*y**(1 - b)*exp(z) + + +def test_issue_22546(): + p1, p2 = symbols('p1, p2', positive=True) + ref = powsimp(p1**z/p2**z) + e = z + 1 + ans = ref.subs(z, e) + assert ans.is_Pow + assert powsimp(p1**e/p2**e) == ans + i = symbols('i', integer=True) + ref = powsimp(x**i/y**i) + e = i + 1 + ans = ref.subs(i, e) + assert ans.is_Pow + assert powsimp(x**e/y**e) == ans diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_radsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_radsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..f8ff955e48a34536c1752c565c0864dedae6a214 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_radsimp.py @@ -0,0 +1,498 @@ +from sympy.core.add import Add +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.polys.polytools import factor +from sympy.series.order import O +from sympy.simplify.radsimp import (collect, collect_const, fraction, radsimp, rcollect) + +from sympy.core.expr import unchanged +from sympy.core.mul import _unevaluated_Mul as umul +from sympy.simplify.radsimp import (_unevaluated_Add, + collect_sqrt, fraction_expand, collect_abs) +from sympy.testing.pytest import raises + +from sympy.abc import x, y, z, a, b, c, d + + +def test_radsimp(): + r2 = sqrt(2) + r3 = sqrt(3) + r5 = sqrt(5) + r7 = sqrt(7) + assert fraction(radsimp(1/r2)) == (sqrt(2), 2) + assert radsimp(1/(1 + r2)) == \ + -1 + sqrt(2) + assert radsimp(1/(r2 + r3)) == \ + -sqrt(2) + sqrt(3) + assert fraction(radsimp(1/(1 + r2 + r3))) == \ + (-sqrt(6) + sqrt(2) + 2, 4) + assert fraction(radsimp(1/(r2 + r3 + r5))) == \ + (-sqrt(30) + 2*sqrt(3) + 3*sqrt(2), 12) + assert fraction(radsimp(1/(1 + r2 + r3 + r5))) == ( + (-34*sqrt(10) - 26*sqrt(15) - 55*sqrt(3) - 61*sqrt(2) + 14*sqrt(30) + + 93 + 46*sqrt(6) + 53*sqrt(5), 71)) + assert fraction(radsimp(1/(r2 + r3 + r5 + r7))) == ( + (-50*sqrt(42) - 133*sqrt(5) - 34*sqrt(70) - 145*sqrt(3) + 22*sqrt(105) + + 185*sqrt(2) + 62*sqrt(30) + 135*sqrt(7), 215)) + z = radsimp(1/(1 + r2/3 + r3/5 + r5 + r7)) + assert len((3616791619821680643598*z).args) == 16 + assert radsimp(1/z) == 1/z + assert radsimp(1/z, max_terms=20).expand() == 1 + r2/3 + r3/5 + r5 + r7 + assert radsimp(1/(r2*3)) == \ + sqrt(2)/6 + assert radsimp(1/(r2*a + r3 + r5 + r7)) == ( + (8*sqrt(2)*a**7 - 8*sqrt(7)*a**6 - 8*sqrt(5)*a**6 - 8*sqrt(3)*a**6 - + 180*sqrt(2)*a**5 + 8*sqrt(30)*a**5 + 8*sqrt(42)*a**5 + 8*sqrt(70)*a**5 + - 24*sqrt(105)*a**4 + 84*sqrt(3)*a**4 + 100*sqrt(5)*a**4 + + 116*sqrt(7)*a**4 - 72*sqrt(70)*a**3 - 40*sqrt(42)*a**3 - + 8*sqrt(30)*a**3 + 782*sqrt(2)*a**3 - 462*sqrt(3)*a**2 - + 302*sqrt(7)*a**2 - 254*sqrt(5)*a**2 + 120*sqrt(105)*a**2 - + 795*sqrt(2)*a - 62*sqrt(30)*a + 82*sqrt(42)*a + 98*sqrt(70)*a - + 118*sqrt(105) + 59*sqrt(7) + 295*sqrt(5) + 531*sqrt(3))/(16*a**8 - + 480*a**6 + 3128*a**4 - 6360*a**2 + 3481)) + assert radsimp(1/(r2*a + r2*b + r3 + r7)) == ( + (sqrt(2)*a*(a + b)**2 - 5*sqrt(2)*a + sqrt(42)*a + sqrt(2)*b*(a + + b)**2 - 5*sqrt(2)*b + sqrt(42)*b - sqrt(7)*(a + b)**2 - sqrt(3)*(a + + b)**2 - 2*sqrt(3) + 2*sqrt(7))/(2*a**4 + 8*a**3*b + 12*a**2*b**2 - + 20*a**2 + 8*a*b**3 - 40*a*b + 2*b**4 - 20*b**2 + 8)) + assert radsimp(1/(r2*a + r2*b + r2*c + r2*d)) == \ + sqrt(2)/(2*a + 2*b + 2*c + 2*d) + assert radsimp(1/(1 + r2*a + r2*b + r2*c + r2*d)) == ( + (sqrt(2)*a + sqrt(2)*b + sqrt(2)*c + sqrt(2)*d - 1)/(2*a**2 + 4*a*b + + 4*a*c + 4*a*d + 2*b**2 + 4*b*c + 4*b*d + 2*c**2 + 4*c*d + 2*d**2 - 1)) + assert radsimp((y**2 - x)/(y - sqrt(x))) == \ + sqrt(x) + y + assert radsimp(-(y**2 - x)/(y - sqrt(x))) == \ + -(sqrt(x) + y) + assert radsimp(1/(1 - I + a*I)) == \ + (-I*a + 1 + I)/(a**2 - 2*a + 2) + assert radsimp(1/((-x + y)*(x - sqrt(y)))) == \ + (-x - sqrt(y))/((x - y)*(x**2 - y)) + e = (3 + 3*sqrt(2))*x*(3*x - 3*sqrt(y)) + assert radsimp(e) == x*(3 + 3*sqrt(2))*(3*x - 3*sqrt(y)) + assert radsimp(1/e) == ( + (-9*x + 9*sqrt(2)*x - 9*sqrt(y) + 9*sqrt(2)*sqrt(y))/(9*x*(9*x**2 - + 9*y))) + assert radsimp(1 + 1/(1 + sqrt(3))) == \ + Mul(S.Half, -1 + sqrt(3), evaluate=False) + 1 + A = symbols("A", commutative=False) + assert radsimp(x**2 + sqrt(2)*x**2 - sqrt(2)*x*A) == \ + x**2 + sqrt(2)*x**2 - sqrt(2)*x*A + assert radsimp(1/sqrt(5 + 2 * sqrt(6))) == -sqrt(2) + sqrt(3) + assert radsimp(1/sqrt(5 + 2 * sqrt(6))**3) == -(-sqrt(3) + sqrt(2))**3 + + # issue 6532 + assert fraction(radsimp(1/sqrt(x))) == (sqrt(x), x) + assert fraction(radsimp(1/sqrt(2*x + 3))) == (sqrt(2*x + 3), 2*x + 3) + assert fraction(radsimp(1/sqrt(2*(x + 3)))) == (sqrt(2*x + 6), 2*x + 6) + + # issue 5994 + e = S('-(2 + 2*sqrt(2) + 4*2**(1/4))/' + '(1 + 2**(3/4) + 3*2**(1/4) + 3*sqrt(2))') + assert radsimp(e).expand() == -2*2**Rational(3, 4) - 2*2**Rational(1, 4) + 2 + 2*sqrt(2) + + # issue 5986 (modifications to radimp didn't initially recognize this so + # the test is included here) + assert radsimp(1/(-sqrt(5)/2 - S.Half + (-sqrt(5)/2 - S.Half)**2)) == 1 + + # from issue 5934 + eq = ( + (-240*sqrt(2)*sqrt(sqrt(5) + 5)*sqrt(8*sqrt(5) + 40) - + 360*sqrt(2)*sqrt(-8*sqrt(5) + 40)*sqrt(-sqrt(5) + 5) - + 120*sqrt(10)*sqrt(-8*sqrt(5) + 40)*sqrt(-sqrt(5) + 5) + + 120*sqrt(2)*sqrt(-sqrt(5) + 5)*sqrt(8*sqrt(5) + 40) + + 120*sqrt(2)*sqrt(-8*sqrt(5) + 40)*sqrt(sqrt(5) + 5) + + 120*sqrt(10)*sqrt(-sqrt(5) + 5)*sqrt(8*sqrt(5) + 40) + + 120*sqrt(10)*sqrt(-8*sqrt(5) + 40)*sqrt(sqrt(5) + 5))/(-36000 - + 7200*sqrt(5) + (12*sqrt(10)*sqrt(sqrt(5) + 5) + + 24*sqrt(10)*sqrt(-sqrt(5) + 5))**2)) + assert radsimp(eq) is S.NaN # it's 0/0 + + # work with normal form + e = 1/sqrt(sqrt(7)/7 + 2*sqrt(2) + 3*sqrt(3) + 5*sqrt(5)) + 3 + assert radsimp(e) == ( + -sqrt(sqrt(7) + 14*sqrt(2) + 21*sqrt(3) + + 35*sqrt(5))*(-11654899*sqrt(35) - 1577436*sqrt(210) - 1278438*sqrt(15) + - 1346996*sqrt(10) + 1635060*sqrt(6) + 5709765 + 7539830*sqrt(14) + + 8291415*sqrt(21))/1300423175 + 3) + + # obey power rules + base = sqrt(3) - sqrt(2) + assert radsimp(1/base**3) == (sqrt(3) + sqrt(2))**3 + assert radsimp(1/(-base)**3) == -(sqrt(2) + sqrt(3))**3 + assert radsimp(1/(-base)**x) == (-base)**(-x) + assert radsimp(1/base**x) == (sqrt(2) + sqrt(3))**x + assert radsimp(root(1/(-1 - sqrt(2)), -x)) == (-1)**(-1/x)*(1 + sqrt(2))**(1/x) + + # recurse + e = cos(1/(1 + sqrt(2))) + assert radsimp(e) == cos(-sqrt(2) + 1) + assert radsimp(e/2) == cos(-sqrt(2) + 1)/2 + assert radsimp(1/e) == 1/cos(-sqrt(2) + 1) + assert radsimp(2/e) == 2/cos(-sqrt(2) + 1) + assert fraction(radsimp(e/sqrt(x))) == (sqrt(x)*cos(-sqrt(2)+1), x) + + # test that symbolic denominators are not processed + r = 1 + sqrt(2) + assert radsimp(x/r, symbolic=False) == -x*(-sqrt(2) + 1) + assert radsimp(x/(y + r), symbolic=False) == x/(y + 1 + sqrt(2)) + assert radsimp(x/(y + r)/r, symbolic=False) == \ + -x*(-sqrt(2) + 1)/(y + 1 + sqrt(2)) + + # issue 7408 + eq = sqrt(x)/sqrt(y) + assert radsimp(eq) == umul(sqrt(x), sqrt(y), 1/y) + assert radsimp(eq, symbolic=False) == eq + + # issue 7498 + assert radsimp(sqrt(x)/sqrt(y)**3) == umul(sqrt(x), sqrt(y**3), 1/y**3) + + # for coverage + eq = sqrt(x)/y**2 + assert radsimp(eq) == eq + + # handle non-Expr args + from sympy.integrals.integrals import Integral + eq = Integral(x/(sqrt(2) - 1), (x, 0, 1/(sqrt(2) + 1))) + assert radsimp(eq) == Integral((sqrt(2) + 1)*x , (x, 0, sqrt(2) - 1)) + + from sympy.sets import FiniteSet + eq = FiniteSet(x/(sqrt(2) - 1)) + assert radsimp(eq) == FiniteSet((sqrt(2) + 1)*x) + +def test_radsimp_issue_3214(): + c, p = symbols('c p', positive=True) + s = sqrt(c**2 - p**2) + b = (c + I*p - s)/(c + I*p + s) + assert radsimp(b) == -I*(c + I*p - sqrt(c**2 - p**2))**2/(2*c*p) + + +def test_collect_1(): + """Collect with respect to Symbol""" + x, y, z, n = symbols('x,y,z,n') + assert collect(1, x) == 1 + assert collect( x + y*x, x ) == x * (1 + y) + assert collect( x + x**2, x ) == x + x**2 + assert collect( x**2 + y*x**2, x ) == (x**2)*(1 + y) + assert collect( x**2 + y*x, x ) == x*y + x**2 + assert collect( 2*x**2 + y*x**2 + 3*x*y, [x] ) == x**2*(2 + y) + 3*x*y + assert collect( 2*x**2 + y*x**2 + 3*x*y, [y] ) == 2*x**2 + y*(x**2 + 3*x) + + assert collect( ((1 + y + x)**4).expand(), x) == ((1 + y)**4).expand() + \ + x*(4*(1 + y)**3).expand() + x**2*(6*(1 + y)**2).expand() + \ + x**3*(4*(1 + y)).expand() + x**4 + # symbols can be given as any iterable + expr = x + y + assert collect(expr, expr.free_symbols) == expr + assert collect(x*exp(x) + sin(x)*y + sin(x)*2 + 3*x, x, exact=None + ) == x*exp(x) + 3*x + (y + 2)*sin(x) + assert collect(x*exp(x) + sin(x)*y + sin(x)*2 + 3*x + y*x + + y*x*exp(x), x, exact=None + ) == x*exp(x)*(y + 1) + (3 + y)*x + (y + 2)*sin(x) + + +def test_collect_2(): + """Collect with respect to a sum""" + a, b, x = symbols('a,b,x') + assert collect(a*(cos(x) + sin(x)) + b*(cos(x) + sin(x)), + sin(x) + cos(x)) == (a + b)*(cos(x) + sin(x)) + + +def test_collect_3(): + """Collect with respect to a product""" + a, b, c = symbols('a,b,c') + f = Function('f') + x, y, z, n = symbols('x,y,z,n') + + assert collect(-x/8 + x*y, -x) == x*(y - Rational(1, 8)) + + assert collect( 1 + x*(y**2), x*y ) == 1 + x*(y**2) + assert collect( x*y + a*x*y, x*y) == x*y*(1 + a) + assert collect( 1 + x*y + a*x*y, x*y) == 1 + x*y*(1 + a) + assert collect(a*x*f(x) + b*(x*f(x)), x*f(x)) == x*(a + b)*f(x) + + assert collect(a*x*log(x) + b*(x*log(x)), x*log(x)) == x*(a + b)*log(x) + assert collect(a*x**2*log(x)**2 + b*(x*log(x))**2, x*log(x)) == \ + x**2*log(x)**2*(a + b) + + # with respect to a product of three symbols + assert collect(y*x*z + a*x*y*z, x*y*z) == (1 + a)*x*y*z + + +def test_collect_4(): + """Collect with respect to a power""" + a, b, c, x = symbols('a,b,c,x') + + assert collect(a*x**c + b*x**c, x**c) == x**c*(a + b) + # issue 6096: 2 stays with c (unless c is integer or x is positive0 + assert collect(a*x**(2*c) + b*x**(2*c), x**c) == x**(2*c)*(a + b) + + +def test_collect_5(): + """Collect with respect to a tuple""" + a, x, y, z, n = symbols('a,x,y,z,n') + assert collect(x**2*y**4 + z*(x*y**2)**2 + z + a*z, [x*y**2, z]) in [ + z*(1 + a + x**2*y**4) + x**2*y**4, + z*(1 + a) + x**2*y**4*(1 + z) ] + assert collect((1 + (x + y) + (x + y)**2).expand(), + [x, y]) == 1 + y + x*(1 + 2*y) + x**2 + y**2 + + +def test_collect_pr19431(): + """Unevaluated collect with respect to a product""" + a = symbols('a') + assert collect(a**2*(a**2 + 1), a**2, evaluate=False)[a**2] == (a**2 + 1) + + +def test_collect_D(): + D = Derivative + f = Function('f') + x, a, b = symbols('x,a,b') + fx = D(f(x), x) + fxx = D(f(x), x, x) + + assert collect(a*fx + b*fx, fx) == (a + b)*fx + assert collect(a*D(fx, x) + b*D(fx, x), fx) == (a + b)*D(fx, x) + assert collect(a*fxx + b*fxx, fx) == (a + b)*D(fx, x) + # issue 4784 + assert collect(5*f(x) + 3*fx, fx) == 5*f(x) + 3*fx + assert collect(f(x) + f(x)*diff(f(x), x) + x*diff(f(x), x)*f(x), f(x).diff(x)) == \ + (x*f(x) + f(x))*D(f(x), x) + f(x) + assert collect(f(x) + f(x)*diff(f(x), x) + x*diff(f(x), x)*f(x), f(x).diff(x), exact=True) == \ + (x*f(x) + f(x))*D(f(x), x) + f(x) + assert collect(1/f(x) + 1/f(x)*diff(f(x), x) + x*diff(f(x), x)/f(x), f(x).diff(x), exact=True) == \ + (1/f(x) + x/f(x))*D(f(x), x) + 1/f(x) + e = (1 + x*fx + fx)/f(x) + assert collect(e.expand(), fx) == fx*(x/f(x) + 1/f(x)) + 1/f(x) + + +def test_collect_func(): + f = ((x + a + 1)**3).expand() + + assert collect(f, x) == a**3 + 3*a**2 + 3*a + x**3 + x**2*(3*a + 3) + \ + x*(3*a**2 + 6*a + 3) + 1 + assert collect(f, x, factor) == x**3 + 3*x**2*(a + 1) + 3*x*(a + 1)**2 + \ + (a + 1)**3 + + assert collect(f, x, evaluate=False) == { + S.One: a**3 + 3*a**2 + 3*a + 1, + x: 3*a**2 + 6*a + 3, x**2: 3*a + 3, + x**3: 1 + } + + assert collect(f, x, factor, evaluate=False) == { + S.One: (a + 1)**3, x: 3*(a + 1)**2, + x**2: umul(S(3), a + 1), x**3: 1} + + +def test_collect_order(): + a, b, x, t = symbols('a,b,x,t') + + assert collect(t + t*x + t*x**2 + O(x**3), t) == t*(1 + x + x**2 + O(x**3)) + assert collect(t + t*x + x**2 + O(x**3), t) == \ + t*(1 + x + O(x**3)) + x**2 + O(x**3) + + f = a*x + b*x + c*x**2 + d*x**2 + O(x**3) + g = x*(a + b) + x**2*(c + d) + O(x**3) + + assert collect(f, x) == g + assert collect(f, x, distribute_order_term=False) == g + + f = sin(a + b).series(b, 0, 10) + + assert collect(f, [sin(a), cos(a)]) == \ + sin(a)*cos(b).series(b, 0, 10) + cos(a)*sin(b).series(b, 0, 10) + assert collect(f, [sin(a), cos(a)], distribute_order_term=False) == \ + sin(a)*cos(b).series(b, 0, 10).removeO() + \ + cos(a)*sin(b).series(b, 0, 10).removeO() + O(b**10) + + +def test_rcollect(): + assert rcollect((x**2*y + x*y + x + y)/(x + y), y) == \ + (x + y*(1 + x + x**2))/(x + y) + assert rcollect(sqrt(-((x + 1)*(y + 1))), z) == sqrt(-((x + 1)*(y + 1))) + + +def test_collect_D_0(): + D = Derivative + f = Function('f') + x, a, b = symbols('x,a,b') + fxx = D(f(x), x, x) + + assert collect(a*fxx + b*fxx, fxx) == (a + b)*fxx + + +def test_collect_Wild(): + """Collect with respect to functions with Wild argument""" + a, b, x, y = symbols('a b x y') + f = Function('f') + w1 = Wild('.1') + w2 = Wild('.2') + assert collect(f(x) + a*f(x), f(w1)) == (1 + a)*f(x) + assert collect(f(x, y) + a*f(x, y), f(w1)) == f(x, y) + a*f(x, y) + assert collect(f(x, y) + a*f(x, y), f(w1, w2)) == (1 + a)*f(x, y) + assert collect(f(x, y) + a*f(x, y), f(w1, w1)) == f(x, y) + a*f(x, y) + assert collect(f(x, x) + a*f(x, x), f(w1, w1)) == (1 + a)*f(x, x) + assert collect(a*(x + 1)**y + (x + 1)**y, w1**y) == (1 + a)*(x + 1)**y + assert collect(a*(x + 1)**y + (x + 1)**y, w1**b) == \ + a*(x + 1)**y + (x + 1)**y + assert collect(a*(x + 1)**y + (x + 1)**y, (x + 1)**w2) == \ + (1 + a)*(x + 1)**y + assert collect(a*(x + 1)**y + (x + 1)**y, w1**w2) == (1 + a)*(x + 1)**y + + +def test_collect_const(): + # coverage not provided by above tests + assert collect_const(2*sqrt(3) + 4*a*sqrt(5)) == \ + 2*(2*sqrt(5)*a + sqrt(3)) # let the primitive reabsorb + assert collect_const(2*sqrt(3) + 4*a*sqrt(5), sqrt(3)) == \ + 2*sqrt(3) + 4*a*sqrt(5) + assert collect_const(sqrt(2)*(1 + sqrt(2)) + sqrt(3) + x*sqrt(2)) == \ + sqrt(2)*(x + 1 + sqrt(2)) + sqrt(3) + + # issue 5290 + assert collect_const(2*x + 2*y + 1, 2) == \ + collect_const(2*x + 2*y + 1) == \ + Add(S.One, Mul(2, x + y, evaluate=False), evaluate=False) + assert collect_const(-y - z) == Mul(-1, y + z, evaluate=False) + assert collect_const(2*x - 2*y - 2*z, 2) == \ + Mul(2, x - y - z, evaluate=False) + assert collect_const(2*x - 2*y - 2*z, -2) == \ + _unevaluated_Add(2*x, Mul(-2, y + z, evaluate=False)) + + # this is why the content_primitive is used + eq = (sqrt(15 + 5*sqrt(2))*x + sqrt(3 + sqrt(2))*y)*2 + assert collect_sqrt(eq + 2) == \ + 2*sqrt(sqrt(2) + 3)*(sqrt(5)*x + y) + 2 + + # issue 16296 + assert collect_const(a + b + x/2 + y/2) == a + b + Mul(S.Half, x + y, evaluate=False) + + +def test_issue_13143(): + f = Function('f') + fx = f(x).diff(x) + e = f(x) + fx + f(x)*fx + # collect function before derivative + assert collect(e, Wild('w')) == f(x)*(fx + 1) + fx + e = f(x) + f(x)*fx + x*fx*f(x) + assert collect(e, fx) == (x*f(x) + f(x))*fx + f(x) + assert collect(e, f(x)) == (x*fx + fx + 1)*f(x) + e = f(x) + fx + f(x)*fx + assert collect(e, [f(x), fx]) == f(x)*(1 + fx) + fx + assert collect(e, [fx, f(x)]) == fx*(1 + f(x)) + f(x) + + +def test_issue_6097(): + assert collect(a*y**(2.0*x) + b*y**(2.0*x), y**x) == (a + b)*(y**x)**2.0 + assert collect(a*2**(2.0*x) + b*2**(2.0*x), 2**x) == (a + b)*(2**x)**2.0 + + +def test_fraction_expand(): + eq = (x + y)*y/x + assert eq.expand(frac=True) == fraction_expand(eq) == (x*y + y**2)/x + assert eq.expand() == y + y**2/x + + +def test_fraction(): + x, y, z = map(Symbol, 'xyz') + A = Symbol('A', commutative=False) + + assert fraction(S.Half) == (1, 2) + + assert fraction(x) == (x, 1) + assert fraction(1/x) == (1, x) + assert fraction(x/y) == (x, y) + assert fraction(x/2) == (x, 2) + + assert fraction(x*y/z) == (x*y, z) + assert fraction(x/(y*z)) == (x, y*z) + + assert fraction(1/y**2) == (1, y**2) + assert fraction(x/y**2) == (x, y**2) + + assert fraction((x**2 + 1)/y) == (x**2 + 1, y) + assert fraction(x*(y + 1)/y**7) == (x*(y + 1), y**7) + + assert fraction(exp(-x), exact=True) == (exp(-x), 1) + assert fraction((1/(x + y))/2, exact=True) == (1, Mul(2,(x + y), evaluate=False)) + + assert fraction(x*A/y) == (x*A, y) + assert fraction(x*A**-1/y) == (x*A**-1, y) + + n = symbols('n', negative=True) + assert fraction(exp(n)) == (1, exp(-n)) + assert fraction(exp(-n)) == (exp(-n), 1) + + p = symbols('p', positive=True) + assert fraction(exp(-p)*log(p), exact=True) == (exp(-p)*log(p), 1) + + m = Mul(1, 1, S.Half, evaluate=False) + assert fraction(m) == (1, 2) + assert fraction(m, exact=True) == (Mul(1, 1, evaluate=False), 2) + + m = Mul(1, 1, S.Half, S.Half, Pow(1, -1, evaluate=False), evaluate=False) + assert fraction(m) == (1, 4) + assert fraction(m, exact=True) == \ + (Mul(1, 1, evaluate=False), Mul(2, 2, 1, evaluate=False)) + + +def test_issue_5615(): + aA, Re, a, b, D = symbols('aA Re a b D') + e = ((D**3*a + b*aA**3)/Re).expand() + assert collect(e, [aA**3/Re, a]) == e + + +def test_issue_5933(): + from sympy.geometry.polygon import (Polygon, RegularPolygon) + from sympy.simplify.radsimp import denom + x = Polygon(*RegularPolygon((0, 0), 1, 5).vertices).centroid.x + assert abs(denom(x).n()) > 1e-12 + assert abs(denom(radsimp(x))) > 1e-12 # in case simplify didn't handle it + + +def test_issue_14608(): + a, b = symbols('a b', commutative=False) + x, y = symbols('x y') + raises(AttributeError, lambda: collect(a*b + b*a, a)) + assert collect(x*y + y*(x+1), a) == x*y + y*(x+1) + assert collect(x*y + y*(x+1) + a*b + b*a, y) == y*(2*x + 1) + a*b + b*a + + +def test_collect_abs(): + s = abs(x) + abs(y) + assert collect_abs(s) == s + assert unchanged(Mul, abs(x), abs(y)) + ans = Abs(x*y) + assert isinstance(ans, Abs) + assert collect_abs(abs(x)*abs(y)) == ans + assert collect_abs(1 + exp(abs(x)*abs(y))) == 1 + exp(ans) + + # See https://github.com/sympy/sympy/issues/12910 + p = Symbol('p', positive=True) + assert collect_abs(p/abs(1-p)).is_commutative is True + + +def test_issue_19149(): + eq = exp(3*x/4) + assert collect(eq, exp(x)) == eq + +def test_issue_19719(): + a, b = symbols('a, b') + expr = a**2 * (b + 1) + (7 + 1/b)/a + collected = collect(expr, (a**2, 1/a), evaluate=False) + # Would return {_Dummy_20**(-2): b + 1, 1/a: 7 + 1/b} without xreplace + assert collected == {a**2: b + 1, 1/a: 7 + 1/b} + + +def test_issue_21355(): + assert radsimp(1/(x + sqrt(x**2))) == 1/(x + sqrt(x**2)) + assert radsimp(1/(x - sqrt(x**2))) == 1/(x - sqrt(x**2)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_ratsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_ratsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..14e84fd2b227518baff1bda4e5b27ecc40a8bcdd --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_ratsimp.py @@ -0,0 +1,78 @@ +from sympy.core.numbers import (Rational, pi) +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.special.error_functions import erf +from sympy.polys.domains import GF +from sympy.simplify.ratsimp import (ratsimp, ratsimpmodprime) + +from sympy.abc import x, y, z, t, a, b, c, d, e + + +def test_ratsimp(): + f, g = 1/x + 1/y, (x + y)/(x*y) + + assert f != g and ratsimp(f) == g + + f, g = 1/(1 + 1/x), 1 - 1/(x + 1) + + assert f != g and ratsimp(f) == g + + f, g = x/(x + y) + y/(x + y), 1 + + assert f != g and ratsimp(f) == g + + f, g = -x - y - y**2/(x + y) + x**2/(x + y), -2*y + + assert f != g and ratsimp(f) == g + + f = (a*c*x*y + a*c*z - b*d*x*y - b*d*z - b*t*x*y - b*t*x - b*t*z + + e*x)/(x*y + z) + G = [a*c - b*d - b*t + (-b*t*x + e*x)/(x*y + z), + a*c - b*d - b*t - ( b*t*x - e*x)/(x*y + z)] + + assert f != g and ratsimp(f) in G + + A = sqrt(pi) + + B = log(erf(x) - 1) + C = log(erf(x) + 1) + + D = 8 - 8*erf(x) + + f = A*B/D - A*C/D + A*C*erf(x)/D - A*B*erf(x)/D + 2*A/D + + assert ratsimp(f) == A*B/8 - A*C/8 - A/(4*erf(x) - 4) + + +def test_ratsimpmodprime(): + a = y**5 + x + y + b = x - y + F = [x*y**5 - x - y] + assert ratsimpmodprime(a/b, F, x, y, order='lex') == \ + (-x**2 - x*y - x - y) / (-x**2 + x*y) + + a = x + y**2 - 2 + b = x + y**2 - y - 1 + F = [x*y - 1] + assert ratsimpmodprime(a/b, F, x, y, order='lex') == \ + (1 + y - x)/(y - x) + + a = 5*x**3 + 21*x**2 + 4*x*y + 23*x + 12*y + 15 + b = 7*x**3 - y*x**2 + 31*x**2 + 2*x*y + 15*y + 37*x + 21 + F = [x**2 + y**2 - 1] + assert ratsimpmodprime(a/b, F, x, y, order='lex') == \ + (1 + 5*y - 5*x)/(8*y - 6*x) + + a = x*y - x - 2*y + 4 + b = x + y**2 - 2*y + F = [x - 2, y - 3] + assert ratsimpmodprime(a/b, F, x, y, order='lex') == \ + Rational(2, 5) + + # Test a bug where denominators would be dropped + assert ratsimpmodprime(x, [y - 2*x], order='lex') == \ + y/2 + + a = (x**5 + 2*x**4 + 2*x**3 + 2*x**2 + x + 2/x + x**(-2)) + assert ratsimpmodprime(a, [x + 1], domain=GF(2)) == 1 + assert ratsimpmodprime(a, [x + 1], domain=GF(3)) == -1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_rewrite.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_rewrite.py new file mode 100644 index 0000000000000000000000000000000000000000..56d2fb7a85bd959bd4accc2f36127429efbdbe70 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_rewrite.py @@ -0,0 +1,31 @@ +from sympy.core.numbers import I +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import (cos, cot, sin) +from sympy.testing.pytest import _both_exp_pow + +x, y, z, n = symbols('x,y,z,n') + + +@_both_exp_pow +def test_has(): + assert cot(x).has(x) + assert cot(x).has(cot) + assert not cot(x).has(sin) + assert sin(x).has(x) + assert sin(x).has(sin) + assert not sin(x).has(cot) + assert exp(x).has(exp) + + +@_both_exp_pow +def test_sin_exp_rewrite(): + assert sin(x).rewrite(sin, exp) == -I/2*(exp(I*x) - exp(-I*x)) + assert sin(x).rewrite(sin, exp).rewrite(exp, sin) == sin(x) + assert cos(x).rewrite(cos, exp).rewrite(exp, cos) == cos(x) + assert (sin(5*y) - sin( + 2*x)).rewrite(sin, exp).rewrite(exp, sin) == sin(5*y) - sin(2*x) + assert sin(x + y).rewrite(sin, exp).rewrite(exp, sin) == sin(x + y) + assert cos(x + y).rewrite(cos, exp).rewrite(exp, cos) == cos(x + y) + # This next test currently passes... not clear whether it should or not? + assert cos(x).rewrite(cos, exp).rewrite(exp, sin) == cos(x) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_simplify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_simplify.py new file mode 100644 index 0000000000000000000000000000000000000000..a5bf469f68adf5c5dfbdf7559414681e2fb28ba7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_simplify.py @@ -0,0 +1,1093 @@ +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.expr import unchanged +from sympy.core.function import (count_ops, diff, expand, expand_multinomial, Function, Derivative) +from sympy.core.mul import Mul, _keep_coeff +from sympy.core import GoldenRatio +from sympy.core.numbers import (E, Float, I, oo, pi, Rational, zoo) +from sympy.core.relational import (Eq, Lt, Gt, Ge, Le) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import (binomial, factorial) +from sympy.functions.elementary.complexes import (Abs, sign) +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.hyperbolic import (cosh, csch, sinh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acos, asin, atan, cos, sin, sinc, tan) +from sympy.functions.special.error_functions import erf +from sympy.functions.special.gamma_functions import gamma +from sympy.functions.special.hyper import hyper +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.geometry.polygon import rad +from sympy.integrals.integrals import (Integral, integrate) +from sympy.logic.boolalg import (And, Or) +from sympy.matrices.dense import (Matrix, eye) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.polys.polytools import (factor, Poly) +from sympy.simplify.simplify import (besselsimp, hypersimp, inversecombine, logcombine, nsimplify, nthroot, posify, separatevars, signsimp, simplify) +from sympy.solvers.solvers import solve + +from sympy.testing.pytest import XFAIL, slow, _both_exp_pow +from sympy.abc import x, y, z, t, a, b, c, d, e, f, g, h, i, n + + +def test_issue_7263(): + assert abs((simplify(30.8**2 - 82.5**2 * sin(rad(11.6))**2)).evalf() - \ + 673.447451402970) < 1e-12 + + +def test_factorial_simplify(): + # There are more tests in test_factorials.py. + x = Symbol('x') + assert simplify(factorial(x)/x) == gamma(x) + assert simplify(factorial(factorial(x))) == factorial(factorial(x)) + + +def test_simplify_expr(): + x, y, z, k, n, m, w, s, A = symbols('x,y,z,k,n,m,w,s,A') + f = Function('f') + + assert all(simplify(tmp) == tmp for tmp in [I, E, oo, x, -x, -oo, -E, -I]) + + e = 1/x + 1/y + assert e != (x + y)/(x*y) + assert simplify(e) == (x + y)/(x*y) + + e = A**2*s**4/(4*pi*k*m**3) + assert simplify(e) == e + + e = (4 + 4*x - 2*(2 + 2*x))/(2 + 2*x) + assert simplify(e) == 0 + + e = (-4*x*y**2 - 2*y**3 - 2*x**2*y)/(x + y)**2 + assert simplify(e) == -2*y + + e = -x - y - (x + y)**(-1)*y**2 + (x + y)**(-1)*x**2 + assert simplify(e) == -2*y + + e = (x + x*y)/x + assert simplify(e) == 1 + y + + e = (f(x) + y*f(x))/f(x) + assert simplify(e) == 1 + y + + e = (2 * (1/n - cos(n * pi)/n))/pi + assert simplify(e) == (-cos(pi*n) + 1)/(pi*n)*2 + + e = integrate(1/(x**3 + 1), x).diff(x) + assert simplify(e) == 1/(x**3 + 1) + + e = integrate(x/(x**2 + 3*x + 1), x).diff(x) + assert simplify(e) == x/(x**2 + 3*x + 1) + + f = Symbol('f') + A = Matrix([[2*k - m*w**2, -k], [-k, k - m*w**2]]).inv() + assert simplify((A*Matrix([0, f]))[1] - + (-f*(2*k - m*w**2)/(k**2 - (k - m*w**2)*(2*k - m*w**2)))) == 0 + + f = -x + y/(z + t) + z*x/(z + t) + z*a/(z + t) + t*x/(z + t) + assert simplify(f) == (y + a*z)/(z + t) + + # issue 10347 + expr = -x*(y**2 - 1)*(2*y**2*(x**2 - 1)/(a*(x**2 - y**2)**2) + (x**2 - 1) + /(a*(x**2 - y**2)))/(a*(x**2 - y**2)) + x*(-2*x**2*sqrt(-x**2*y**2 + x**2 + + y**2 - 1)*sin(z)/(a*(x**2 - y**2)**2) - x**2*sqrt(-x**2*y**2 + x**2 + + y**2 - 1)*sin(z)/(a*(x**2 - 1)*(x**2 - y**2)) + (x**2*sqrt((-x**2 + 1)* + (y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*sin(z)/(x**2 - 1) + sqrt( + (-x**2 + 1)*(y**2 - 1))*(x*(-x*y**2 + x)/sqrt(-x**2*y**2 + x**2 + y**2 - + 1) + sqrt(-x**2*y**2 + x**2 + y**2 - 1))*sin(z))/(a*sqrt((-x**2 + 1)*( + y**2 - 1))*(x**2 - y**2)))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*sin(z)/(a* + (x**2 - y**2)) + x*(-2*x**2*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z)/(a* + (x**2 - y**2)**2) - x**2*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z)/(a* + (x**2 - 1)*(x**2 - y**2)) + (x**2*sqrt((-x**2 + 1)*(y**2 - 1))*sqrt(-x**2 + *y**2 + x**2 + y**2 - 1)*cos(z)/(x**2 - 1) + x*sqrt((-x**2 + 1)*(y**2 - + 1))*(-x*y**2 + x)*cos(z)/sqrt(-x**2*y**2 + x**2 + y**2 - 1) + sqrt((-x**2 + + 1)*(y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z))/(a*sqrt((-x**2 + + 1)*(y**2 - 1))*(x**2 - y**2)))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos( + z)/(a*(x**2 - y**2)) - y*sqrt((-x**2 + 1)*(y**2 - 1))*(-x*y*sqrt(-x**2* + y**2 + x**2 + y**2 - 1)*sin(z)/(a*(x**2 - y**2)*(y**2 - 1)) + 2*x*y*sqrt( + -x**2*y**2 + x**2 + y**2 - 1)*sin(z)/(a*(x**2 - y**2)**2) + (x*y*sqrt(( + -x**2 + 1)*(y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*sin(z)/(y**2 - + 1) + x*sqrt((-x**2 + 1)*(y**2 - 1))*(-x**2*y + y)*sin(z)/sqrt(-x**2*y**2 + + x**2 + y**2 - 1))/(a*sqrt((-x**2 + 1)*(y**2 - 1))*(x**2 - y**2)))*sin( + z)/(a*(x**2 - y**2)) + y*(x**2 - 1)*(-2*x*y*(x**2 - 1)/(a*(x**2 - y**2) + **2) + 2*x*y/(a*(x**2 - y**2)))/(a*(x**2 - y**2)) + y*(x**2 - 1)*(y**2 - + 1)*(-x*y*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z)/(a*(x**2 - y**2)*(y**2 + - 1)) + 2*x*y*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z)/(a*(x**2 - y**2) + **2) + (x*y*sqrt((-x**2 + 1)*(y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - + 1)*cos(z)/(y**2 - 1) + x*sqrt((-x**2 + 1)*(y**2 - 1))*(-x**2*y + y)*cos( + z)/sqrt(-x**2*y**2 + x**2 + y**2 - 1))/(a*sqrt((-x**2 + 1)*(y**2 - 1) + )*(x**2 - y**2)))*cos(z)/(a*sqrt((-x**2 + 1)*(y**2 - 1))*(x**2 - y**2) + ) - x*sqrt((-x**2 + 1)*(y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*sin( + z)**2/(a**2*(x**2 - 1)*(x**2 - y**2)*(y**2 - 1)) - x*sqrt((-x**2 + 1)*( + y**2 - 1))*sqrt(-x**2*y**2 + x**2 + y**2 - 1)*cos(z)**2/(a**2*(x**2 - 1)*( + x**2 - y**2)*(y**2 - 1)) + assert simplify(expr) == 2*x/(a**2*(x**2 - y**2)) + + #issue 17631 + assert simplify('((-1/2)*Boole(True)*Boole(False)-1)*Boole(True)') == \ + Mul(sympify('(2 + Boole(True)*Boole(False))'), sympify('-Boole(True)/2')) + + A, B = symbols('A,B', commutative=False) + + assert simplify(A*B - B*A) == A*B - B*A + assert simplify(A/(1 + y/x)) == x*A/(x + y) + assert simplify(A*(1/x + 1/y)) == A/x + A/y #(x + y)*A/(x*y) + + assert simplify(log(2) + log(3)) == log(6) + assert simplify(log(2*x) - log(2)) == log(x) + + assert simplify(hyper([], [], x)) == exp(x) + + +def test_issue_3557(): + f_1 = x*a + y*b + z*c - 1 + f_2 = x*d + y*e + z*f - 1 + f_3 = x*g + y*h + z*i - 1 + + solutions = solve([f_1, f_2, f_3], x, y, z, simplify=False) + + assert simplify(solutions[y]) == \ + (a*i + c*d + f*g - a*f - c*g - d*i)/ \ + (a*e*i + b*f*g + c*d*h - a*f*h - b*d*i - c*e*g) + + +def test_simplify_other(): + assert simplify(sin(x)**2 + cos(x)**2) == 1 + assert simplify(gamma(x + 1)/gamma(x)) == x + assert simplify(sin(x)**2 + cos(x)**2 + factorial(x)/gamma(x)) == 1 + x + assert simplify( + Eq(sin(x)**2 + cos(x)**2, factorial(x)/gamma(x))) == Eq(x, 1) + nc = symbols('nc', commutative=False) + assert simplify(x + x*nc) == x*(1 + nc) + # issue 6123 + # f = exp(-I*(k*sqrt(t) + x/(2*sqrt(t)))**2) + # ans = integrate(f, (k, -oo, oo), conds='none') + ans = I*(-pi*x*exp(I*pi*Rational(-3, 4) + I*x**2/(4*t))*erf(x*exp(I*pi*Rational(-3, 4))/ + (2*sqrt(t)))/(2*sqrt(t)) + pi*x*exp(I*pi*Rational(-3, 4) + I*x**2/(4*t))/ + (2*sqrt(t)))*exp(-I*x**2/(4*t))/(sqrt(pi)*x) - I*sqrt(pi) * \ + (-erf(x*exp(I*pi/4)/(2*sqrt(t))) + 1)*exp(I*pi/4)/(2*sqrt(t)) + assert simplify(ans) == -(-1)**Rational(3, 4)*sqrt(pi)/sqrt(t) + # issue 6370 + assert simplify(2**(2 + x)/4) == 2**x + + +@_both_exp_pow +def test_simplify_complex(): + cosAsExp = cos(x)._eval_rewrite_as_exp(x) + tanAsExp = tan(x)._eval_rewrite_as_exp(x) + assert simplify(cosAsExp*tanAsExp) == sin(x) # issue 4341 + + # issue 10124 + assert simplify(exp(Matrix([[0, -1], [1, 0]]))) == Matrix([[cos(1), + -sin(1)], [sin(1), cos(1)]]) + + +def test_simplify_ratio(): + # roots of x**3-3*x+5 + roots = ['(1/2 - sqrt(3)*I/2)*(sqrt(21)/2 + 5/2)**(1/3) + 1/((1/2 - ' + 'sqrt(3)*I/2)*(sqrt(21)/2 + 5/2)**(1/3))', + '1/((1/2 + sqrt(3)*I/2)*(sqrt(21)/2 + 5/2)**(1/3)) + ' + '(1/2 + sqrt(3)*I/2)*(sqrt(21)/2 + 5/2)**(1/3)', + '-(sqrt(21)/2 + 5/2)**(1/3) - 1/(sqrt(21)/2 + 5/2)**(1/3)'] + + for r in roots: + r = S(r) + assert count_ops(simplify(r, ratio=1)) <= count_ops(r) + # If ratio=oo, simplify() is always applied: + assert simplify(r, ratio=oo) is not r + + +def test_simplify_measure(): + measure1 = lambda expr: len(str(expr)) + measure2 = lambda expr: -count_ops(expr) + # Return the most complicated result + expr = (x + 1)/(x + sin(x)**2 + cos(x)**2) + assert measure1(simplify(expr, measure=measure1)) <= measure1(expr) + assert measure2(simplify(expr, measure=measure2)) <= measure2(expr) + + expr2 = Eq(sin(x)**2 + cos(x)**2, 1) + assert measure1(simplify(expr2, measure=measure1)) <= measure1(expr2) + assert measure2(simplify(expr2, measure=measure2)) <= measure2(expr2) + + +def test_simplify_rational(): + expr = 2**x*2.**y + assert simplify(expr, rational = True) == 2**(x+y) + assert simplify(expr, rational = None) == 2.0**(x+y) + assert simplify(expr, rational = False) == expr + assert simplify('0.9 - 0.8 - 0.1', rational = True) == 0 + + +def test_simplify_issue_1308(): + assert simplify(exp(Rational(-1, 2)) + exp(Rational(-3, 2))) == \ + (1 + E)*exp(Rational(-3, 2)) + + +def test_issue_5652(): + assert simplify(E + exp(-E)) == exp(-E) + E + n = symbols('n', commutative=False) + assert simplify(n + n**(-n)) == n + n**(-n) + +def test_issue_27380(): + assert simplify(1.0**(x+1)/1.0**x) == 1.0 + +def test_simplify_fail1(): + x = Symbol('x') + y = Symbol('y') + e = (x + y)**2/(-4*x*y**2 - 2*y**3 - 2*x**2*y) + assert simplify(e) == 1 / (-2*y) + + +def test_nthroot(): + assert nthroot(90 + 34*sqrt(7), 3) == sqrt(7) + 3 + q = 1 + sqrt(2) - 2*sqrt(3) + sqrt(6) + sqrt(7) + assert nthroot(expand_multinomial(q**3), 3) == q + assert nthroot(41 + 29*sqrt(2), 5) == 1 + sqrt(2) + assert nthroot(-41 - 29*sqrt(2), 5) == -1 - sqrt(2) + expr = 1320*sqrt(10) + 4216 + 2576*sqrt(6) + 1640*sqrt(15) + assert nthroot(expr, 5) == 1 + sqrt(6) + sqrt(15) + q = 1 + sqrt(2) + sqrt(3) + sqrt(5) + assert expand_multinomial(nthroot(expand_multinomial(q**5), 5)) == q + q = 1 + sqrt(2) + 7*sqrt(6) + 2*sqrt(10) + assert nthroot(expand_multinomial(q**5), 5, 8) == q + q = 1 + sqrt(2) - 2*sqrt(3) + 1171*sqrt(6) + assert nthroot(expand_multinomial(q**3), 3) == q + assert nthroot(expand_multinomial(q**6), 6) == q + + +def test_nthroot1(): + q = 1 + sqrt(2) + sqrt(3) + S.One/10**20 + p = expand_multinomial(q**5) + assert nthroot(p, 5) == q + q = 1 + sqrt(2) + sqrt(3) + S.One/10**30 + p = expand_multinomial(q**5) + assert nthroot(p, 5) == q + + +@_both_exp_pow +def test_separatevars(): + x, y, z, n = symbols('x,y,z,n') + assert separatevars(2*n*x*z + 2*x*y*z) == 2*x*z*(n + y) + assert separatevars(x*z + x*y*z) == x*z*(1 + y) + assert separatevars(pi*x*z + pi*x*y*z) == pi*x*z*(1 + y) + assert separatevars(x*y**2*sin(x) + x*sin(x)*sin(y)) == \ + x*(sin(y) + y**2)*sin(x) + assert separatevars(x*exp(x + y) + x*exp(x)) == x*(1 + exp(y))*exp(x) + assert separatevars((x*(y + 1))**z).is_Pow # != x**z*(1 + y)**z + assert separatevars(1 + x + y + x*y) == (x + 1)*(y + 1) + assert separatevars(y/pi*exp(-(z - x)/cos(n))) == \ + y*exp(x/cos(n))*exp(-z/cos(n))/pi + assert separatevars((x + y)*(x - y) + y**2 + 2*x + 1) == (x + 1)**2 + # issue 4858 + p = Symbol('p', positive=True) + assert separatevars(sqrt(p**2 + x*p**2)) == p*sqrt(1 + x) + assert separatevars(sqrt(y*(p**2 + x*p**2))) == p*sqrt(y*(1 + x)) + assert separatevars(sqrt(y*(p**2 + x*p**2)), force=True) == \ + p*sqrt(y)*sqrt(1 + x) + # issue 4865 + assert separatevars(sqrt(x*y)).is_Pow + assert separatevars(sqrt(x*y), force=True) == sqrt(x)*sqrt(y) + # issue 4957 + # any type sequence for symbols is fine + assert separatevars(((2*x + 2)*y), dict=True, symbols=()) == \ + {'coeff': 1, x: 2*x + 2, y: y} + # separable + assert separatevars(((2*x + 2)*y), dict=True, symbols=[x]) == \ + {'coeff': y, x: 2*x + 2} + assert separatevars(((2*x + 2)*y), dict=True, symbols=[]) == \ + {'coeff': 1, x: 2*x + 2, y: y} + assert separatevars(((2*x + 2)*y), dict=True) == \ + {'coeff': 1, x: 2*x + 2, y: y} + assert separatevars(((2*x + 2)*y), dict=True, symbols=None) == \ + {'coeff': y*(2*x + 2)} + # not separable + assert separatevars(3, dict=True) is None + assert separatevars(2*x + y, dict=True, symbols=()) is None + assert separatevars(2*x + y, dict=True) is None + assert separatevars(2*x + y, dict=True, symbols=None) == {'coeff': 2*x + y} + # issue 4808 + n, m = symbols('n,m', commutative=False) + assert separatevars(m + n*m) == (1 + n)*m + assert separatevars(x + x*n) == x*(1 + n) + # issue 4910 + f = Function('f') + assert separatevars(f(x) + x*f(x)) == f(x) + x*f(x) + # a noncommutable object present + eq = x*(1 + hyper((), (), y*z)) + assert separatevars(eq) == eq + + s = separatevars(abs(x*y)) + assert s == abs(x)*abs(y) and s.is_Mul + z = cos(1)**2 + sin(1)**2 - 1 + a = abs(x*z) + s = separatevars(a) + assert not a.is_Mul and s.is_Mul and s == abs(x)*abs(z) + s = separatevars(abs(x*y*z)) + assert s == abs(x)*abs(y)*abs(z) + + # abs(x+y)/abs(z) would be better but we test this here to + # see that it doesn't raise + assert separatevars(abs((x+y)/z)) == abs((x+y)/z) + + +def test_separatevars_advanced_factor(): + x, y, z = symbols('x,y,z') + assert separatevars(1 + log(x)*log(y) + log(x) + log(y)) == \ + (log(x) + 1)*(log(y) + 1) + assert separatevars(1 + x - log(z) - x*log(z) - exp(y)*log(z) - + x*exp(y)*log(z) + x*exp(y) + exp(y)) == \ + -((x + 1)*(log(z) - 1)*(exp(y) + 1)) + x, y = symbols('x,y', positive=True) + assert separatevars(1 + log(x**log(y)) + log(x*y)) == \ + (log(x) + 1)*(log(y) + 1) + + +def test_hypersimp(): + n, k = symbols('n,k', integer=True) + + assert hypersimp(factorial(k), k) == k + 1 + assert hypersimp(factorial(k**2), k) is None + + assert hypersimp(1/factorial(k), k) == 1/(k + 1) + + assert hypersimp(2**k/factorial(k)**2, k) == 2/(k + 1)**2 + + assert hypersimp(binomial(n, k), k) == (n - k)/(k + 1) + assert hypersimp(binomial(n + 1, k), k) == (n - k + 1)/(k + 1) + + term = (4*k + 1)*factorial(k)/factorial(2*k + 1) + assert hypersimp(term, k) == S.Half*((4*k + 5)/(3 + 14*k + 8*k**2)) + + term = 1/((2*k - 1)*factorial(2*k + 1)) + assert hypersimp(term, k) == (k - S.Half)/((k + 1)*(2*k + 1)*(2*k + 3)) + + term = binomial(n, k)*(-1)**k/factorial(k) + assert hypersimp(term, k) == (k - n)/(k + 1)**2 + + +def test_nsimplify(): + x = Symbol("x") + assert nsimplify(0) == 0 + assert nsimplify(-1) == -1 + assert nsimplify(1) == 1 + assert nsimplify(1 + x) == 1 + x + assert nsimplify(2.7) == Rational(27, 10) + assert nsimplify(1 - GoldenRatio) == (1 - sqrt(5))/2 + assert nsimplify((1 + sqrt(5))/4, [GoldenRatio]) == GoldenRatio/2 + assert nsimplify(2/GoldenRatio, [GoldenRatio]) == 2*GoldenRatio - 2 + assert nsimplify(exp(pi*I*Rational(5, 3), evaluate=False)) == \ + sympify('1/2 - sqrt(3)*I/2') + assert nsimplify(sin(pi*Rational(3, 5), evaluate=False)) == \ + sympify('sqrt(sqrt(5)/8 + 5/8)') + assert nsimplify(sqrt(atan('1', evaluate=False))*(2 + I), [pi]) == \ + sqrt(pi) + sqrt(pi)/2*I + assert nsimplify(2 + exp(2*atan('1/4')*I)) == sympify('49/17 + 8*I/17') + assert nsimplify(pi, tolerance=0.01) == Rational(22, 7) + assert nsimplify(pi, tolerance=0.001) == Rational(355, 113) + assert nsimplify(0.33333, tolerance=1e-4) == Rational(1, 3) + assert nsimplify(2.0**(1/3.), tolerance=0.001) == Rational(635, 504) + assert nsimplify(2.0**(1/3.), tolerance=0.001, full=True) == \ + 2**Rational(1, 3) + assert nsimplify(x + .5, rational=True) == S.Half + x + assert nsimplify(1/.3 + x, rational=True) == Rational(10, 3) + x + assert nsimplify(log(3).n(), rational=True) == \ + sympify('109861228866811/100000000000000') + assert nsimplify(Float(0.272198261287950), [pi, log(2)]) == pi*log(2)/8 + assert nsimplify(Float(0.272198261287950).n(3), [pi, log(2)]) == \ + -pi/4 - log(2) + Rational(7, 4) + assert nsimplify(x/7.0) == x/7 + assert nsimplify(pi/1e2) == pi/100 + assert nsimplify(pi/1e2, rational=False) == pi/100.0 + assert nsimplify(pi/1e-7) == 10000000*pi + assert not nsimplify( + factor(-3.0*z**2*(z**2)**(-2.5) + 3*(z**2)**(-1.5))).atoms(Float) + e = x**0.0 + assert e.is_Pow and nsimplify(x**0.0) == 1 + assert nsimplify(3.333333, tolerance=0.1, rational=True) == Rational(10, 3) + assert nsimplify(3.333333, tolerance=0.01, rational=True) == Rational(10, 3) + assert nsimplify(3.666666, tolerance=0.1, rational=True) == Rational(11, 3) + assert nsimplify(3.666666, tolerance=0.01, rational=True) == Rational(11, 3) + assert nsimplify(33, tolerance=10, rational=True) == Rational(33) + assert nsimplify(33.33, tolerance=10, rational=True) == Rational(30) + assert nsimplify(37.76, tolerance=10, rational=True) == Rational(40) + assert nsimplify(-203.1) == Rational(-2031, 10) + assert nsimplify(.2, tolerance=0) == Rational(1, 5) + assert nsimplify(-.2, tolerance=0) == Rational(-1, 5) + assert nsimplify(.2222, tolerance=0) == Rational(1111, 5000) + assert nsimplify(-.2222, tolerance=0) == Rational(-1111, 5000) + # issue 7211, PR 4112 + assert nsimplify(S(2e-8)) == Rational(1, 50000000) + # issue 7322 direct test + assert nsimplify(1e-42, rational=True) != 0 + # issue 10336 + inf = Float('inf') + infs = (-oo, oo, inf, -inf) + for zi in infs: + ans = sign(zi)*oo + assert nsimplify(zi) == ans + assert nsimplify(zi + x) == x + ans + + assert nsimplify(0.33333333, rational=True, rational_conversion='exact') == Rational(0.33333333) + + # Make sure nsimplify on expressions uses full precision + assert nsimplify(pi.evalf(100)*x, rational_conversion='exact').evalf(100) == pi.evalf(100)*x + + +def test_issue_9448(): + tmp = sympify("1/(1 - (-1)**(2/3) - (-1)**(1/3)) + 1/(1 + (-1)**(2/3) + (-1)**(1/3))") + assert nsimplify(tmp) == S.Half + + +def test_extract_minus_sign(): + x = Symbol("x") + y = Symbol("y") + a = Symbol("a") + b = Symbol("b") + assert simplify(-x/-y) == x/y + assert simplify(-x/y) == -x/y + assert simplify(x/y) == x/y + assert simplify(x/-y) == -x/y + assert simplify(-x/0) == zoo*x + assert simplify(Rational(-5, 0)) is zoo + assert simplify(-a*x/(-y - b)) == a*x/(b + y) + + +def test_diff(): + x = Symbol("x") + y = Symbol("y") + f = Function("f") + g = Function("g") + assert simplify(g(x).diff(x)*f(x).diff(x) - f(x).diff(x)*g(x).diff(x)) == 0 + assert simplify(2*f(x)*f(x).diff(x) - diff(f(x)**2, x)) == 0 + assert simplify(diff(1/f(x), x) + f(x).diff(x)/f(x)**2) == 0 + assert simplify(f(x).diff(x, y) - f(x).diff(y, x)) == 0 + + +def test_logcombine_1(): + x, y = symbols("x,y") + a = Symbol("a") + z, w = symbols("z,w", positive=True) + b = Symbol("b", real=True) + assert logcombine(log(x) + 2*log(y)) == log(x) + 2*log(y) + assert logcombine(log(x) + 2*log(y), force=True) == log(x*y**2) + assert logcombine(a*log(w) + log(z)) == a*log(w) + log(z) + assert logcombine(b*log(z) + b*log(x)) == log(z**b) + b*log(x) + assert logcombine(b*log(z) - log(w)) == log(z**b/w) + assert logcombine(log(x)*log(z)) == log(x)*log(z) + assert logcombine(log(w)*log(x)) == log(w)*log(x) + assert logcombine(cos(-2*log(z) + b*log(w))) in [cos(log(w**b/z**2)), + cos(log(z**2/w**b))] + assert logcombine(log(log(x) - log(y)) - log(z), force=True) == \ + log(log(x/y)/z) + assert logcombine((2 + I)*log(x), force=True) == (2 + I)*log(x) + assert logcombine((x**2 + log(x) - log(y))/(x*y), force=True) == \ + (x**2 + log(x/y))/(x*y) + # the following could also give log(z*x**log(y**2)), what we + # are testing is that a canonical result is obtained + assert logcombine(log(x)*2*log(y) + log(z), force=True) == \ + log(z*y**log(x**2)) + assert logcombine((x*y + sqrt(x**4 + y**4) + log(x) - log(y))/(pi*x**Rational(2, 3)* + sqrt(y)**3), force=True) == ( + x*y + sqrt(x**4 + y**4) + log(x/y))/(pi*x**Rational(2, 3)*y**Rational(3, 2)) + assert logcombine(gamma(-log(x/y))*acos(-log(x/y)), force=True) == \ + acos(-log(x/y))*gamma(-log(x/y)) + + assert logcombine(2*log(z)*log(w)*log(x) + log(z) + log(w)) == \ + log(z**log(w**2))*log(x) + log(w*z) + assert logcombine(3*log(w) + 3*log(z)) == log(w**3*z**3) + assert logcombine(x*(y + 1) + log(2) + log(3)) == x*(y + 1) + log(6) + assert logcombine((x + y)*log(w) + (-x - y)*log(3)) == (x + y)*log(w/3) + # a single unknown can combine + assert logcombine(log(x) + log(2)) == log(2*x) + eq = log(abs(x)) + log(abs(y)) + assert logcombine(eq) == eq + reps = {x: 0, y: 0} + assert log(abs(x)*abs(y)).subs(reps) != eq.subs(reps) + + +def test_logcombine_complex_coeff(): + i = Integral((sin(x**2) + cos(x**3))/x, x) + assert logcombine(i, force=True) == i + assert logcombine(i + 2*log(x), force=True) == \ + i + log(x**2) + + +def test_issue_5950(): + x, y = symbols("x,y", positive=True) + assert logcombine(log(3) - log(2)) == log(Rational(3,2), evaluate=False) + assert logcombine(log(x) - log(y)) == log(x/y) + assert logcombine(log(Rational(3,2), evaluate=False) - log(2)) == \ + log(Rational(3,4), evaluate=False) + + +def test_posify(): + x = symbols('x') + + assert str(posify( + x + + Symbol('p', positive=True) + + Symbol('n', negative=True))) == '(_x + n + p, {_x: x})' + + eq, rep = posify(1/x) + assert log(eq).expand().subs(rep) == -log(x) + assert str(posify([x, 1 + x])) == '([_x, _x + 1], {_x: x})' + + p = symbols('p', positive=True) + n = symbols('n', negative=True) + orig = [x, n, p] + modified, reps = posify(orig) + assert str(modified) == '[_x, n, p]' + assert [w.subs(reps) for w in modified] == orig + + assert str(Integral(posify(1/x + y)[0], (y, 1, 3)).expand()) == \ + 'Integral(1/_x, (y, 1, 3)) + Integral(_y, (y, 1, 3))' + assert str(Sum(posify(1/x**n)[0], (n,1,3)).expand()) == \ + 'Sum(_x**(-n), (n, 1, 3))' + + A = Matrix([[1, 2, 3], [4, 5, 6 * Abs(x)]]) + Ap, rep = posify(A) + assert Ap == A.subs(*reversed(rep.popitem())) + + # issue 16438 + k = Symbol('k', finite=True) + eq, rep = posify(k) + assert eq.assumptions0 == {'positive': True, 'zero': False, 'imaginary': False, + 'nonpositive': False, 'commutative': True, 'hermitian': True, 'real': True, 'nonzero': True, + 'nonnegative': True, 'negative': False, 'complex': True, 'finite': True, + 'infinite': False, 'extended_real':True, 'extended_negative': False, + 'extended_nonnegative': True, 'extended_nonpositive': False, + 'extended_nonzero': True, 'extended_positive': True} + + +def test_issue_4194(): + # simplify should call cancel + f = Function('f') + assert simplify((4*x + 6*f(y))/(2*x + 3*f(y))) == 2 + + +@XFAIL +def test_simplify_float_vs_integer(): + # Test for issue 4473: + # https://github.com/sympy/sympy/issues/4473 + assert simplify(x**2.0 - x**2) == 0 + assert simplify(x**2 - x**2.0) == 0 + + +def test_as_content_primitive(): + assert (x/2 + y).as_content_primitive() == (S.Half, x + 2*y) + assert (x/2 + y).as_content_primitive(clear=False) == (S.One, x/2 + y) + assert (y*(x/2 + y)).as_content_primitive() == (S.Half, y*(x + 2*y)) + assert (y*(x/2 + y)).as_content_primitive(clear=False) == (S.One, y*(x/2 + y)) + + # although the _as_content_primitive methods do not alter the underlying structure, + # the as_content_primitive function will touch up the expression and join + # bases that would otherwise have not been joined. + assert (x*(2 + 2*x)*(3*x + 3)**2).as_content_primitive() == \ + (18, x*(x + 1)**3) + assert (2 + 2*x + 2*y*(3 + 3*y)).as_content_primitive() == \ + (2, x + 3*y*(y + 1) + 1) + assert ((2 + 6*x)**2).as_content_primitive() == \ + (4, (3*x + 1)**2) + assert ((2 + 6*x)**(2*y)).as_content_primitive() == \ + (1, (_keep_coeff(S(2), (3*x + 1)))**(2*y)) + assert (5 + 10*x + 2*y*(3 + 3*y)).as_content_primitive() == \ + (1, 10*x + 6*y*(y + 1) + 5) + assert (5*(x*(1 + y)) + 2*x*(3 + 3*y)).as_content_primitive() == \ + (11, x*(y + 1)) + assert ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive() == \ + (121, x**2*(y + 1)**2) + assert (y**2).as_content_primitive() == \ + (1, y**2) + assert (S.Infinity).as_content_primitive() == (1, oo) + eq = x**(2 + y) + assert (eq).as_content_primitive() == (1, eq) + assert (S.Half**(2 + x)).as_content_primitive() == (Rational(1, 4), 2**-x) + assert (Rational(-1, 2)**(2 + x)).as_content_primitive() == \ + (Rational(1, 4), (Rational(-1, 2))**x) + assert (Rational(-1, 2)**(2 + x)).as_content_primitive() == \ + (Rational(1, 4), Rational(-1, 2)**x) + assert (4**((1 + y)/2)).as_content_primitive() == (2, 4**(y/2)) + assert (3**((1 + y)/2)).as_content_primitive() == \ + (1, 3**(Mul(S.Half, 1 + y, evaluate=False))) + assert (5**Rational(3, 4)).as_content_primitive() == (1, 5**Rational(3, 4)) + assert (5**Rational(7, 4)).as_content_primitive() == (5, 5**Rational(3, 4)) + assert Add(z*Rational(5, 7), 0.5*x, y*Rational(3, 2), evaluate=False).as_content_primitive() == \ + (Rational(1, 14), 7.0*x + 21*y + 10*z) + assert (2**Rational(3, 4) + 2**Rational(1, 4)*sqrt(3)).as_content_primitive(radical=True) == \ + (1, 2**Rational(1, 4)*(sqrt(2) + sqrt(3))) + + +def test_signsimp(): + e = x*(-x + 1) + x*(x - 1) + assert signsimp(Eq(e, 0)) is S.true + assert Abs(x - 1) == Abs(1 - x) + assert signsimp(y - x) == y - x + assert signsimp(y - x, evaluate=False) == Mul(-1, x - y, evaluate=False) + + +def test_besselsimp(): + from sympy.functions.special.bessel import (besseli, besselj, bessely) + from sympy.integrals.transforms import cosine_transform + assert besselsimp(exp(-I*pi*y/2)*besseli(y, z*exp_polar(I*pi/2))) == \ + besselj(y, z) + assert besselsimp(exp(-I*pi*a/2)*besseli(a, 2*sqrt(x)*exp_polar(I*pi/2))) == \ + besselj(a, 2*sqrt(x)) + assert besselsimp(sqrt(2)*sqrt(pi)*x**Rational(1, 4)*exp(I*pi/4)*exp(-I*pi*a/2) * + besseli(Rational(-1, 2), sqrt(x)*exp_polar(I*pi/2)) * + besseli(a, sqrt(x)*exp_polar(I*pi/2))/2) == \ + besselj(a, sqrt(x)) * cos(sqrt(x)) + assert besselsimp(besseli(Rational(-1, 2), z)) == \ + sqrt(2)*cosh(z)/(sqrt(pi)*sqrt(z)) + assert besselsimp(besseli(a, z*exp_polar(-I*pi/2))) == \ + exp(-I*pi*a/2)*besselj(a, z) + assert cosine_transform(1/t*sin(a/t), t, y) == \ + sqrt(2)*sqrt(pi)*besselj(0, 2*sqrt(a)*sqrt(y))/2 + + assert besselsimp(x**2*(a*(-2*besselj(5*I, x) + besselj(-2 + 5*I, x) + + besselj(2 + 5*I, x)) + b*(-2*bessely(5*I, x) + bessely(-2 + 5*I, x) + + bessely(2 + 5*I, x)))/4 + x*(a*(besselj(-1 + 5*I, x)/2 - besselj(1 + 5*I, x)/2) + + b*(bessely(-1 + 5*I, x)/2 - bessely(1 + 5*I, x)/2)) + (x**2 + 25)*(a*besselj(5*I, x) + + b*bessely(5*I, x))) == 0 + + assert besselsimp(81*x**2*(a*(besselj(Rational(-5, 3), 9*x) - 2*besselj(Rational(1, 3), 9*x) + besselj(Rational(7, 3), 9*x)) + + b*(bessely(Rational(-5, 3), 9*x) - 2*bessely(Rational(1, 3), 9*x) + bessely(Rational(7, 3), 9*x)))/4 + x*(a*(9*besselj(Rational(-2, 3), 9*x)/2 + - 9*besselj(Rational(4, 3), 9*x)/2) + b*(9*bessely(Rational(-2, 3), 9*x)/2 - 9*bessely(Rational(4, 3), 9*x)/2)) + + (81*x**2 - Rational(1, 9))*(a*besselj(Rational(1, 3), 9*x) + b*bessely(Rational(1, 3), 9*x))) == 0 + + assert besselsimp(besselj(a-1,x) + besselj(a+1, x) - 2*a*besselj(a, x)/x) == 0 + + assert besselsimp(besselj(a-1,x) + besselj(a+1, x) + besselj(a, x)) == (2*a + x)*besselj(a, x)/x + + assert besselsimp(x**2* besselj(a,x) + x**3*besselj(a+1, x) + besselj(a+2, x)) == \ + 2*a*x*besselj(a + 1, x) + x**3*besselj(a + 1, x) - x**2*besselj(a + 2, x) + 2*x*besselj(a + 1, x) + besselj(a + 2, x) + +def test_Piecewise(): + e1 = x*(x + y) - y*(x + y) + e2 = sin(x)**2 + cos(x)**2 + e3 = expand((x + y)*y/x) + s1 = simplify(e1) + s2 = simplify(e2) + s3 = simplify(e3) + assert simplify(Piecewise((e1, x < e2), (e3, True))) == \ + Piecewise((s1, x < s2), (s3, True)) + + +def test_polymorphism(): + class A(Basic): + def _eval_simplify(x, **kwargs): + return S.One + + a = A(S(5), S(2)) + assert simplify(a) == 1 + + +def test_issue_from_PR1599(): + n1, n2, n3, n4 = symbols('n1 n2 n3 n4', negative=True) + assert simplify(I*sqrt(n1)) == -sqrt(-n1) + + +def test_issue_6811(): + eq = (x + 2*y)*(2*x + 2) + assert simplify(eq) == (x + 1)*(x + 2*y)*2 + # reject the 2-arg Mul -- these are a headache for test writing + assert simplify(eq.expand()) == \ + 2*x**2 + 4*x*y + 2*x + 4*y + + +def test_issue_6920(): + e = [cos(x) + I*sin(x), cos(x) - I*sin(x), + cosh(x) - sinh(x), cosh(x) + sinh(x)] + ok = [exp(I*x), exp(-I*x), exp(-x), exp(x)] + # wrap in f to show that the change happens wherever ei occurs + f = Function('f') + assert [simplify(f(ei)).args[0] for ei in e] == ok + + +def test_issue_7001(): + from sympy.abc import r, R + assert simplify(-(r*Piecewise((pi*Rational(4, 3), r <= R), + (-8*pi*R**3/(3*r**3), True)) + 2*Piecewise((pi*r*Rational(4, 3), r <= R), + (4*pi*R**3/(3*r**2), True)))/(4*pi*r)) == \ + Piecewise((-1, r <= R), (0, True)) + + +def test_inequality_no_auto_simplify(): + # no simplify on creation but can be simplified + lhs = cos(x)**2 + sin(x)**2 + rhs = 2 + e = Lt(lhs, rhs, evaluate=False) + assert e is not S.true + assert simplify(e) + + +def test_issue_9398(): + from sympy.core.numbers import Number + from sympy.polys.polytools import cancel + assert cancel(1e-14) != 0 + assert cancel(1e-14*I) != 0 + + assert simplify(1e-14) != 0 + assert simplify(1e-14*I) != 0 + + assert (I*Number(1.)*Number(10)**Number(-14)).simplify() != 0 + + assert cancel(1e-20) != 0 + assert cancel(1e-20*I) != 0 + + assert simplify(1e-20) != 0 + assert simplify(1e-20*I) != 0 + + assert cancel(1e-100) != 0 + assert cancel(1e-100*I) != 0 + + assert simplify(1e-100) != 0 + assert simplify(1e-100*I) != 0 + + f = Float("1e-1000") + assert cancel(f) != 0 + assert cancel(f*I) != 0 + + assert simplify(f) != 0 + assert simplify(f*I) != 0 + + +def test_issue_9324_simplify(): + M = MatrixSymbol('M', 10, 10) + e = M[0, 0] + M[5, 4] + 1304 + assert simplify(e) == e + + +def test_issue_9817_simplify(): + # simplify on trace of substituted explicit quadratic form of matrix + # expressions (a scalar) should return without errors (AttributeError) + # See issue #9817 and #9190 for the original bug more discussion on this + from sympy.matrices.expressions import Identity, trace + v = MatrixSymbol('v', 3, 1) + A = MatrixSymbol('A', 3, 3) + x = Matrix([i + 1 for i in range(3)]) + X = Identity(3) + quadratic = v.T * A * v + assert simplify((trace(quadratic.as_explicit())).xreplace({v:x, A:X})) == 14 + + +def test_issue_13474(): + x = Symbol('x') + assert simplify(x + csch(sinc(1))) == x + csch(sinc(1)) + + +@_both_exp_pow +def test_simplify_function_inverse(): + # "inverse" attribute does not guarantee that f(g(x)) is x + # so this simplification should not happen automatically. + # See issue #12140 + x, y = symbols('x, y') + g = Function('g') + + class f(Function): + def inverse(self, argindex=1): + return g + + assert simplify(f(g(x))) == f(g(x)) + assert inversecombine(f(g(x))) == x + assert simplify(f(g(x)), inverse=True) == x + assert simplify(f(g(sin(x)**2 + cos(x)**2)), inverse=True) == 1 + assert simplify(f(g(x, y)), inverse=True) == f(g(x, y)) + assert unchanged(asin, sin(x)) + assert simplify(asin(sin(x))) == asin(sin(x)) + assert simplify(2*asin(sin(3*x)), inverse=True) == 6*x + assert simplify(log(exp(x))) == log(exp(x)) + assert simplify(log(exp(x)), inverse=True) == x + assert simplify(exp(log(x)), inverse=True) == x + assert simplify(log(exp(x), 2), inverse=True) == x/log(2) + assert simplify(log(exp(x), 2, evaluate=False), inverse=True) == x/log(2) + + +def test_clear_coefficients(): + from sympy.simplify.simplify import clear_coefficients + assert clear_coefficients(4*y*(6*x + 3)) == (y*(2*x + 1), 0) + assert clear_coefficients(4*y*(6*x + 3) - 2) == (y*(2*x + 1), Rational(1, 6)) + assert clear_coefficients(4*y*(6*x + 3) - 2, x) == (y*(2*x + 1), x/12 + Rational(1, 6)) + assert clear_coefficients(sqrt(2) - 2) == (sqrt(2), 2) + assert clear_coefficients(4*sqrt(2) - 2) == (sqrt(2), S.Half) + assert clear_coefficients(S(3), x) == (0, x - 3) + assert clear_coefficients(S.Infinity, x) == (S.Infinity, x) + assert clear_coefficients(-S.Pi, x) == (S.Pi, -x) + assert clear_coefficients(2 - S.Pi/3, x) == (pi, -3*x + 6) + +def test_nc_simplify(): + from sympy.simplify.simplify import nc_simplify + from sympy.matrices.expressions import MatPow, Identity + from sympy.core import Pow + from functools import reduce + + a, b, c, d = symbols('a b c d', commutative = False) + x = Symbol('x') + A = MatrixSymbol("A", x, x) + B = MatrixSymbol("B", x, x) + C = MatrixSymbol("C", x, x) + D = MatrixSymbol("D", x, x) + subst = {a: A, b: B, c: C, d:D} + funcs = {Add: lambda x,y: x+y, Mul: lambda x,y: x*y } + + def _to_matrix(expr): + if expr in subst: + return subst[expr] + if isinstance(expr, Pow): + return MatPow(_to_matrix(expr.args[0]), expr.args[1]) + elif isinstance(expr, (Add, Mul)): + return reduce(funcs[expr.func],[_to_matrix(a) for a in expr.args]) + else: + return expr*Identity(x) + + def _check(expr, simplified, deep=True, matrix=True): + assert nc_simplify(expr, deep=deep) == simplified + assert expand(expr) == expand(simplified) + if matrix: + m_simp = _to_matrix(simplified).doit(inv_expand=False) + assert nc_simplify(_to_matrix(expr), deep=deep) == m_simp + + _check(a*b*a*b*a*b*c*(a*b)**3*c, ((a*b)**3*c)**2) + _check(a*b*(a*b)**-2*a*b, 1) + _check(a**2*b*a*b*a*b*(a*b)**-1, a*(a*b)**2, matrix=False) + _check(b*a*b**2*a*b**2*a*b**2, b*(a*b**2)**3) + _check(a*b*a**2*b*a**2*b*a**3, (a*b*a)**3*a**2) + _check(a**2*b*a**4*b*a**4*b*a**2, (a**2*b*a**2)**3) + _check(a**3*b*a**4*b*a**4*b*a, a**3*(b*a**4)**3*a**-3) + _check(a*b*a*b + a*b*c*x*a*b*c, (a*b)**2 + x*(a*b*c)**2) + _check(a*b*a*b*c*a*b*a*b*c, ((a*b)**2*c)**2) + _check(b**-1*a**-1*(a*b)**2, a*b) + _check(a**-1*b*c**-1, (c*b**-1*a)**-1) + expr = a**3*b*a**4*b*a**4*b*a**2*b*a**2*(b*a**2)**2*b*a**2*b*a**2 + for _ in range(10): + expr *= a*b + _check(expr, a**3*(b*a**4)**2*(b*a**2)**6*(a*b)**10) + _check((a*b*a*b)**2, (a*b*a*b)**2, deep=False) + _check(a*b*(c*d)**2, a*b*(c*d)**2) + expr = b**-1*(a**-1*b**-1 - a**-1*c*b**-1)**-1*a**-1 + assert nc_simplify(expr) == (1-c)**-1 + # commutative expressions should be returned without an error + assert nc_simplify(2*x**2) == 2*x**2 + +def test_issue_15965(): + A = Sum(z*x**y, (x, 1, a)) + anew = z*Sum(x**y, (x, 1, a)) + B = Integral(x*y, x) + bdo = x**2*y/2 + assert simplify(A + B) == anew + bdo + assert simplify(A) == anew + assert simplify(B) == bdo + assert simplify(B, doit=False) == y*Integral(x, x) + + +def test_issue_17137(): + assert simplify(cos(x)**I) == cos(x)**I + assert simplify(cos(x)**(2 + 3*I)) == cos(x)**(2 + 3*I) + + +def test_issue_21869(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + expr = And(Eq(x**2, 4), Le(x, y)) + assert expr.simplify() == expr + + expr = And(Eq(x**2, 4), Eq(x, 2)) + assert expr.simplify() == Eq(x, 2) + + expr = And(Eq(x**3, x**2), Eq(x, 1)) + assert expr.simplify() == Eq(x, 1) + + expr = And(Eq(sin(x), x**2), Eq(x, 0)) + assert expr.simplify() == Eq(x, 0) + + expr = And(Eq(x**3, x**2), Eq(x, 2)) + assert expr.simplify() == S.false + + expr = And(Eq(y, x**2), Eq(x, 1)) + assert expr.simplify() == And(Eq(y,1), Eq(x, 1)) + + expr = And(Eq(y**2, 1), Eq(y, x**2), Eq(x, 1)) + assert expr.simplify() == And(Eq(y,1), Eq(x, 1)) + + expr = And(Eq(y**2, 4), Eq(y, 2*x**2), Eq(x, 1)) + assert expr.simplify() == And(Eq(y,2), Eq(x, 1)) + + expr = And(Eq(y**2, 4), Eq(y, x**2), Eq(x, 1)) + assert expr.simplify() == S.false + + +def test_issue_7971_21740(): + z = Integral(x, (x, 1, 1)) + assert z != 0 + assert simplify(z) is S.Zero + assert simplify(S.Zero) is S.Zero + z = simplify(Float(0)) + assert z is not S.Zero and z == 0.0 + + +@slow +def test_issue_17141_slow(): + # Should not give RecursionError + assert simplify((2**acos(I+1)**2).rewrite('log')) == 2**((pi + 2*I*log(-1 + + sqrt(1 - 2*I) + I))**2/4) + + +def test_issue_17141(): + # Check that there is no RecursionError + assert simplify(x**(1 / acos(I))) == x**(2/(pi - 2*I*log(1 + sqrt(2)))) + assert simplify(acos(-I)**2*acos(I)**2) == \ + log(1 + sqrt(2))**4 + pi**2*log(1 + sqrt(2))**2/2 + pi**4/16 + assert simplify(2**acos(I)**2) == 2**((pi - 2*I*log(1 + sqrt(2)))**2/4) + p = 2**acos(I+1)**2 + assert simplify(p) == p + + +def test_simplify_kroneckerdelta(): + i, j = symbols("i j") + K = KroneckerDelta + + assert simplify(K(i, j)) == K(i, j) + assert simplify(K(0, j)) == K(0, j) + assert simplify(K(i, 0)) == K(i, 0) + + assert simplify(K(0, j).rewrite(Piecewise) * K(1, j)) == 0 + assert simplify(K(1, i) + Piecewise((1, Eq(j, 2)), (0, True))) == K(1, i) + K(2, j) + + # issue 17214 + assert simplify(K(0, j) * K(1, j)) == 0 + + n = Symbol('n', integer=True) + assert simplify(K(0, n) * K(1, n)) == 0 + + M = Matrix(4, 4, lambda i, j: K(j - i, n) if i <= j else 0) + assert simplify(M**2) == Matrix([[K(0, n), 0, K(1, n), 0], + [0, K(0, n), 0, K(1, n)], + [0, 0, K(0, n), 0], + [0, 0, 0, K(0, n)]]) + assert simplify(eye(1) * KroneckerDelta(0, n) * + KroneckerDelta(1, n)) == Matrix([[0]]) + + assert simplify(S.Infinity * KroneckerDelta(0, n) * + KroneckerDelta(1, n)) is S.NaN + + +def test_issue_17292(): + assert simplify(abs(x)/abs(x**2)) == 1/abs(x) + # this is bigger than the issue: check that deep processing works + assert simplify(5*abs((x**2 - 1)/(x - 1))) == 5*Abs(x + 1) + + +def test_issue_19822(): + expr = And(Gt(n-2, 1), Gt(n, 1)) + assert simplify(expr) == Gt(n, 3) + + +def test_issue_18645(): + expr = And(Ge(x, 3), Le(x, 3)) + assert simplify(expr) == Eq(x, 3) + expr = And(Eq(x, 3), Le(x, 3)) + assert simplify(expr) == Eq(x, 3) + + +@XFAIL +def test_issue_18642(): + i = Symbol("i", integer=True) + n = Symbol("n", integer=True) + expr = And(Eq(i, 2 * n), Le(i, 2*n -1)) + assert simplify(expr) == S.false + + +@XFAIL +def test_issue_18389(): + n = Symbol("n", integer=True) + expr = Eq(n, 0) | (n >= 1) + assert simplify(expr) == Ge(n, 0) + + +def test_issue_8373(): + x = Symbol('x', real=True) + assert simplify(Or(x < 1, x >= 1)) == S.true + + +def test_issue_7950(): + expr = And(Eq(x, 1), Eq(x, 2)) + assert simplify(expr) == S.false + + +def test_issue_22020(): + expr = I*pi/2 -oo + assert simplify(expr) == expr + # Used to throw an error + + +def test_issue_19484(): + assert simplify(sign(x) * Abs(x)) == x + + e = x + sign(x + x**3) + assert simplify(Abs(x + x**3)*e) == x**3 + x*Abs(x**3 + x) + x + + e = x**2 + sign(x**3 + 1) + assert simplify(Abs(x**3 + 1) * e) == x**3 + x**2*Abs(x**3 + 1) + 1 + + f = Function('f') + e = x + sign(x + f(x)**3) + assert simplify(Abs(x + f(x)**3) * e) == x*Abs(x + f(x)**3) + x + f(x)**3 + + +def test_issue_23543(): + # Used to give an error + x, y, z = symbols("x y z", commutative=False) + assert (x*(y + z/2)).simplify() == x*(2*y + z)/2 + + +def test_issue_11004(): + + def f(n): + return sqrt(2*pi*n) * (n/E)**n + + def m(n, k): + return f(n) / (f(n/k)**k) + + def p(n,k): + return m(n, k) / (k**n) + + N, k = symbols('N k') + half = Float('0.5', 4) + z = log(p(n, k) / p(n, k + 1)).expand(force=True) + r = simplify(z.subs(n, N).n(4)) + assert r == ( + half*k*log(k) + - half*k*log(k + 1) + + half*log(N) + - half*log(k + 1) + + Float(0.9189224, 4) + ) + + +def test_issue_19161(): + polynomial = Poly('x**2').simplify() + assert (polynomial-x**2).simplify() == 0 + + +def test_issue_22210(): + d = Symbol('d', integer=True) + expr = 2*Derivative(sin(x), (x, d)) + assert expr.simplify() == expr + + +def test_reduce_inverses_nc_pow(): + x, y = symbols("x y", commutative=True) + Z = symbols("Z", commutative=False) + assert simplify(2**Z * y**Z) == 2**Z * y**Z + assert simplify(x**Z * y**Z) == x**Z * y**Z + x, y = symbols("x y", positive=True) + assert expand((x*y)**Z) == x**Z * y**Z + assert simplify(x**Z * y**Z) == expand((x*y)**Z) + +def test_nc_recursion_coeff(): + X = symbols("X", commutative = False) + assert (2 * cos(pi/3) * X).simplify() == X + assert (2.0 * cos(pi/3) * X).simplify() == X diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_sqrtdenest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_sqrtdenest.py new file mode 100644 index 0000000000000000000000000000000000000000..41c771bb2055a1199d349ae3649f33927d79313a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_sqrtdenest.py @@ -0,0 +1,204 @@ +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Integer, Rational) +from sympy.core.symbol import Symbol +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import cos +from sympy.integrals.integrals import Integral +from sympy.simplify.sqrtdenest import sqrtdenest +from sympy.simplify.sqrtdenest import ( + _subsets as subsets, _sqrt_numeric_denest) + +r2, r3, r5, r6, r7, r10, r15, r29 = [sqrt(x) for x in (2, 3, 5, 6, 7, 10, + 15, 29)] + + +def test_sqrtdenest(): + d = {sqrt(5 + 2 * r6): r2 + r3, + sqrt(5. + 2 * r6): sqrt(5. + 2 * r6), + sqrt(5. + 4*sqrt(5 + 2 * r6)): sqrt(5.0 + 4*r2 + 4*r3), + sqrt(r2): sqrt(r2), + sqrt(5 + r7): sqrt(5 + r7), + sqrt(3 + sqrt(5 + 2*r7)): + 3*r2*(5 + 2*r7)**Rational(1, 4)/(2*sqrt(6 + 3*r7)) + + r2*sqrt(6 + 3*r7)/(2*(5 + 2*r7)**Rational(1, 4)), + sqrt(3 + 2*r3): 3**Rational(3, 4)*(r6/2 + 3*r2/2)/3} + for i in d: + assert sqrtdenest(i) == d[i], i + + +def test_sqrtdenest2(): + assert sqrtdenest(sqrt(16 - 2*r29 + 2*sqrt(55 - 10*r29))) == \ + r5 + sqrt(11 - 2*r29) + e = sqrt(-r5 + sqrt(-2*r29 + 2*sqrt(-10*r29 + 55) + 16)) + assert sqrtdenest(e) == root(-2*r29 + 11, 4) + r = sqrt(1 + r7) + assert sqrtdenest(sqrt(1 + r)) == sqrt(1 + r) + e = sqrt(((1 + sqrt(1 + 2*sqrt(3 + r2 + r5)))**2).expand()) + assert sqrtdenest(e) == 1 + sqrt(1 + 2*sqrt(r2 + r5 + 3)) + + assert sqrtdenest(sqrt(5*r3 + 6*r2)) == \ + sqrt(2)*root(3, 4) + root(3, 4)**3 + + assert sqrtdenest(sqrt(((1 + r5 + sqrt(1 + r3))**2).expand())) == \ + 1 + r5 + sqrt(1 + r3) + + assert sqrtdenest(sqrt(((1 + r5 + r7 + sqrt(1 + r3))**2).expand())) == \ + 1 + sqrt(1 + r3) + r5 + r7 + + e = sqrt(((1 + cos(2) + cos(3) + sqrt(1 + r3))**2).expand()) + assert sqrtdenest(e) == cos(3) + cos(2) + 1 + sqrt(1 + r3) + + e = sqrt(-2*r10 + 2*r2*sqrt(-2*r10 + 11) + 14) + assert sqrtdenest(e) == sqrt(-2*r10 - 2*r2 + 4*r5 + 14) + + # check that the result is not more complicated than the input + z = sqrt(-2*r29 + cos(2) + 2*sqrt(-10*r29 + 55) + 16) + assert sqrtdenest(z) == z + + assert sqrtdenest(sqrt(r6 + sqrt(15))) == sqrt(r6 + sqrt(15)) + + z = sqrt(15 - 2*sqrt(31) + 2*sqrt(55 - 10*r29)) + assert sqrtdenest(z) == z + + +def test_sqrtdenest_rec(): + assert sqrtdenest(sqrt(-4*sqrt(14) - 2*r6 + 4*sqrt(21) + 33)) == \ + -r2 + r3 + 2*r7 + assert sqrtdenest(sqrt(-28*r7 - 14*r5 + 4*sqrt(35) + 82)) == \ + -7 + r5 + 2*r7 + assert sqrtdenest(sqrt(6*r2/11 + 2*sqrt(22)/11 + 6*sqrt(11)/11 + 2)) == \ + sqrt(11)*(r2 + 3 + sqrt(11))/11 + assert sqrtdenest(sqrt(468*r3 + 3024*r2 + 2912*r6 + 19735)) == \ + 9*r3 + 26 + 56*r6 + z = sqrt(-490*r3 - 98*sqrt(115) - 98*sqrt(345) - 2107) + assert sqrtdenest(z) == sqrt(-1)*(7*r5 + 7*r15 + 7*sqrt(23)) + z = sqrt(-4*sqrt(14) - 2*r6 + 4*sqrt(21) + 34) + assert sqrtdenest(z) == z + assert sqrtdenest(sqrt(-8*r2 - 2*r5 + 18)) == -r10 + 1 + r2 + r5 + assert sqrtdenest(sqrt(8*r2 + 2*r5 - 18)) == \ + sqrt(-1)*(-r10 + 1 + r2 + r5) + assert sqrtdenest(sqrt(8*r2/3 + 14*r5/3 + Rational(154, 9))) == \ + -r10/3 + r2 + r5 + 3 + assert sqrtdenest(sqrt(sqrt(2*r6 + 5) + sqrt(2*r7 + 8))) == \ + sqrt(1 + r2 + r3 + r7) + assert sqrtdenest(sqrt(4*r15 + 8*r5 + 12*r3 + 24)) == 1 + r3 + r5 + r15 + + w = 1 + r2 + r3 + r5 + r7 + assert sqrtdenest(sqrt((w**2).expand())) == w + z = sqrt((w**2).expand() + 1) + assert sqrtdenest(z) == z + + z = sqrt(2*r10 + 6*r2 + 4*r5 + 12 + 10*r15 + 30*r3) + assert sqrtdenest(z) == z + + +def test_issue_6241(): + z = sqrt( -320 + 32*sqrt(5) + 64*r15) + assert sqrtdenest(z) == z + + +def test_sqrtdenest3(): + z = sqrt(13 - 2*r10 + 2*r2*sqrt(-2*r10 + 11)) + assert sqrtdenest(z) == -1 + r2 + r10 + assert sqrtdenest(z, max_iter=1) == -1 + sqrt(2) + sqrt(10) + z = sqrt(sqrt(r2 + 2) + 2) + assert sqrtdenest(z) == z + assert sqrtdenest(sqrt(-2*r10 + 4*r2*sqrt(-2*r10 + 11) + 20)) == \ + sqrt(-2*r10 - 4*r2 + 8*r5 + 20) + assert sqrtdenest(sqrt((112 + 70*r2) + (46 + 34*r2)*r5)) == \ + r10 + 5 + 4*r2 + 3*r5 + z = sqrt(5 + sqrt(2*r6 + 5)*sqrt(-2*r29 + 2*sqrt(-10*r29 + 55) + 16)) + r = sqrt(-2*r29 + 11) + assert sqrtdenest(z) == sqrt(r2*r + r3*r + r10 + r15 + 5) + + n = sqrt(2*r6/7 + 2*r7/7 + 2*sqrt(42)/7 + 2) + d = sqrt(16 - 2*r29 + 2*sqrt(55 - 10*r29)) + assert sqrtdenest(n/d) == r7*(1 + r6 + r7)/(Mul(7, (sqrt(-2*r29 + 11) + r5), + evaluate=False)) + + +def test_sqrtdenest4(): + # see Denest_en.pdf in https://github.com/sympy/sympy/issues/3192 + z = sqrt(8 - r2*sqrt(5 - r5) - sqrt(3)*(1 + r5)) + z1 = sqrtdenest(z) + c = sqrt(-r5 + 5) + z1 = ((-r15*c - r3*c + c + r5*c - r6 - r2 + r10 + sqrt(30))/4).expand() + assert sqrtdenest(z) == z1 + + z = sqrt(2*r2*sqrt(r2 + 2) + 5*r2 + 4*sqrt(r2 + 2) + 8) + assert sqrtdenest(z) == r2 + sqrt(r2 + 2) + 2 + + w = 2 + r2 + r3 + (1 + r3)*sqrt(2 + r2 + 5*r3) + z = sqrt((w**2).expand()) + assert sqrtdenest(z) == w.expand() + + +def test_sqrt_symbolic_denest(): + x = Symbol('x') + z = sqrt(((1 + sqrt(sqrt(2 + x) + 3))**2).expand()) + assert sqrtdenest(z) == sqrt((1 + sqrt(sqrt(2 + x) + 3))**2) + z = sqrt(((1 + sqrt(sqrt(2 + cos(1)) + 3))**2).expand()) + assert sqrtdenest(z) == 1 + sqrt(sqrt(2 + cos(1)) + 3) + z = ((1 + cos(2))**4 + 1).expand() + assert sqrtdenest(z) == z + z = sqrt(((1 + sqrt(sqrt(2 + cos(3*x)) + 3))**2 + 1).expand()) + assert sqrtdenest(z) == z + c = cos(3) + c2 = c**2 + assert sqrtdenest(sqrt(2*sqrt(1 + r3)*c + c2 + 1 + r3*c2)) == \ + -1 - sqrt(1 + r3)*c + ra = sqrt(1 + r3) + z = sqrt(20*ra*sqrt(3 + 3*r3) + 12*r3*ra*sqrt(3 + 3*r3) + 64*r3 + 112) + assert sqrtdenest(z) == z + + +def test_issue_5857(): + from sympy.abc import x, y + z = sqrt(1/(4*r3 + 7) + 1) + ans = (r2 + r6)/(r3 + 2) + assert sqrtdenest(z) == ans + assert sqrtdenest(1 + z) == 1 + ans + assert sqrtdenest(Integral(z + 1, (x, 1, 2))) == \ + Integral(1 + ans, (x, 1, 2)) + assert sqrtdenest(x + sqrt(y)) == x + sqrt(y) + ans = (r2 + r6)/(r3 + 2) + assert sqrtdenest(z) == ans + assert sqrtdenest(1 + z) == 1 + ans + assert sqrtdenest(Integral(z + 1, (x, 1, 2))) == \ + Integral(1 + ans, (x, 1, 2)) + assert sqrtdenest(x + sqrt(y)) == x + sqrt(y) + + +def test_subsets(): + assert subsets(1) == [[1]] + assert subsets(4) == [ + [1, 0, 0, 0], [0, 1, 0, 0], [1, 1, 0, 0], [0, 0, 1, 0], [1, 0, 1, 0], + [0, 1, 1, 0], [1, 1, 1, 0], [0, 0, 0, 1], [1, 0, 0, 1], [0, 1, 0, 1], + [1, 1, 0, 1], [0, 0, 1, 1], [1, 0, 1, 1], [0, 1, 1, 1], [1, 1, 1, 1]] + + +def test_issue_5653(): + assert sqrtdenest( + sqrt(2 + sqrt(2 + sqrt(2)))) == sqrt(2 + sqrt(2 + sqrt(2))) + +def test_issue_12420(): + assert sqrtdenest((3 - sqrt(2)*sqrt(4 + 3*I) + 3*I)/2) == I + e = 3 - sqrt(2)*sqrt(4 + I) + 3*I + assert sqrtdenest(e) == e + +def test_sqrt_ratcomb(): + assert sqrtdenest(sqrt(1 + r3) + sqrt(3 + 3*r3) - sqrt(10 + 6*r3)) == 0 + +def test_issue_18041(): + e = -sqrt(-2 + 2*sqrt(3)*I) + assert sqrtdenest(e) == -1 - sqrt(3)*I + +def test_issue_19914(): + a = Integer(-8) + b = Integer(-1) + r = Integer(63) + d2 = a*a - b*b*r + + assert _sqrt_numeric_denest(a, b, r, d2) == \ + sqrt(14)*I/2 + 3*sqrt(2)*I/2 + assert sqrtdenest(sqrt(-8-sqrt(63))) == sqrt(14)*I/2 + 3*sqrt(2)*I/2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_trigsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_trigsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..ea091ec8a6c7d654405968e3d035c2bbe02ccdf7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/tests/test_trigsimp.py @@ -0,0 +1,520 @@ +from itertools import product +from sympy.core.function import (Subs, count_ops, diff, expand) +from sympy.core.numbers import (E, I, Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (cosh, coth, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, cot, sin, tan) +from sympy.functions.elementary.trigonometric import (acos, asin, atan2) +from sympy.functions.elementary.trigonometric import (asec, acsc) +from sympy.functions.elementary.trigonometric import (acot, atan) +from sympy.integrals.integrals import integrate +from sympy.matrices.dense import Matrix +from sympy.simplify.simplify import simplify +from sympy.simplify.trigsimp import (exptrigsimp, trigsimp) + +from sympy.testing.pytest import XFAIL + +from sympy.abc import x, y + + + +def test_trigsimp1(): + x, y = symbols('x,y') + + assert trigsimp(1 - sin(x)**2) == cos(x)**2 + assert trigsimp(1 - cos(x)**2) == sin(x)**2 + assert trigsimp(sin(x)**2 + cos(x)**2) == 1 + assert trigsimp(1 + tan(x)**2) == 1/cos(x)**2 + assert trigsimp(1/cos(x)**2 - 1) == tan(x)**2 + assert trigsimp(1/cos(x)**2 - tan(x)**2) == 1 + assert trigsimp(1 + cot(x)**2) == 1/sin(x)**2 + assert trigsimp(1/sin(x)**2 - 1) == 1/tan(x)**2 + assert trigsimp(1/sin(x)**2 - cot(x)**2) == 1 + + assert trigsimp(5*cos(x)**2 + 5*sin(x)**2) == 5 + assert trigsimp(5*cos(x/2)**2 + 2*sin(x/2)**2) == 3*cos(x)/2 + Rational(7, 2) + + assert trigsimp(sin(x)/cos(x)) == tan(x) + assert trigsimp(2*tan(x)*cos(x)) == 2*sin(x) + assert trigsimp(cot(x)**3*sin(x)**3) == cos(x)**3 + assert trigsimp(y*tan(x)**2/sin(x)**2) == y/cos(x)**2 + assert trigsimp(cot(x)/cos(x)) == 1/sin(x) + + assert trigsimp(sin(x + y) + sin(x - y)) == 2*sin(x)*cos(y) + assert trigsimp(sin(x + y) - sin(x - y)) == 2*sin(y)*cos(x) + assert trigsimp(cos(x + y) + cos(x - y)) == 2*cos(x)*cos(y) + assert trigsimp(cos(x + y) - cos(x - y)) == -2*sin(x)*sin(y) + assert trigsimp(tan(x + y) - tan(x)/(1 - tan(x)*tan(y))) == \ + sin(y)/(-sin(y)*tan(x) + cos(y)) # -tan(y)/(tan(x)*tan(y) - 1) + + assert trigsimp(sinh(x + y) + sinh(x - y)) == 2*sinh(x)*cosh(y) + assert trigsimp(sinh(x + y) - sinh(x - y)) == 2*sinh(y)*cosh(x) + assert trigsimp(cosh(x + y) + cosh(x - y)) == 2*cosh(x)*cosh(y) + assert trigsimp(cosh(x + y) - cosh(x - y)) == 2*sinh(x)*sinh(y) + assert trigsimp(tanh(x + y) - tanh(x)/(1 + tanh(x)*tanh(y))) == \ + sinh(y)/(sinh(y)*tanh(x) + cosh(y)) + + assert trigsimp(cos(0.12345)**2 + sin(0.12345)**2) == 1.0 + e = 2*sin(x)**2 + 2*cos(x)**2 + assert trigsimp(log(e)) == log(2) + + +def test_trigsimp1a(): + assert trigsimp(sin(2)**2*cos(3)*exp(2)/cos(2)**2) == tan(2)**2*cos(3)*exp(2) + assert trigsimp(tan(2)**2*cos(3)*exp(2)*cos(2)**2) == sin(2)**2*cos(3)*exp(2) + assert trigsimp(cot(2)*cos(3)*exp(2)*sin(2)) == cos(3)*exp(2)*cos(2) + assert trigsimp(tan(2)*cos(3)*exp(2)/sin(2)) == cos(3)*exp(2)/cos(2) + assert trigsimp(cot(2)*cos(3)*exp(2)/cos(2)) == cos(3)*exp(2)/sin(2) + assert trigsimp(cot(2)*cos(3)*exp(2)*tan(2)) == cos(3)*exp(2) + assert trigsimp(sinh(2)*cos(3)*exp(2)/cosh(2)) == tanh(2)*cos(3)*exp(2) + assert trigsimp(tanh(2)*cos(3)*exp(2)*cosh(2)) == sinh(2)*cos(3)*exp(2) + assert trigsimp(coth(2)*cos(3)*exp(2)*sinh(2)) == cosh(2)*cos(3)*exp(2) + assert trigsimp(tanh(2)*cos(3)*exp(2)/sinh(2)) == cos(3)*exp(2)/cosh(2) + assert trigsimp(coth(2)*cos(3)*exp(2)/cosh(2)) == cos(3)*exp(2)/sinh(2) + assert trigsimp(coth(2)*cos(3)*exp(2)*tanh(2)) == cos(3)*exp(2) + + +def test_trigsimp2(): + x, y = symbols('x,y') + assert trigsimp(cos(x)**2*sin(y)**2 + cos(x)**2*cos(y)**2 + sin(x)**2, + recursive=True) == 1 + assert trigsimp(sin(x)**2*sin(y)**2 + sin(x)**2*cos(y)**2 + cos(x)**2, + recursive=True) == 1 + assert trigsimp( + Subs(x, x, sin(y)**2 + cos(y)**2)) == Subs(x, x, 1) + + +def test_issue_4373(): + x = Symbol("x") + assert abs(trigsimp(2.0*sin(x)**2 + 2.0*cos(x)**2) - 2.0) < 1e-10 + + +def test_trigsimp3(): + x, y = symbols('x,y') + assert trigsimp(sin(x)/cos(x)) == tan(x) + assert trigsimp(sin(x)**2/cos(x)**2) == tan(x)**2 + assert trigsimp(sin(x)**3/cos(x)**3) == tan(x)**3 + assert trigsimp(sin(x)**10/cos(x)**10) == tan(x)**10 + + assert trigsimp(cos(x)/sin(x)) == 1/tan(x) + assert trigsimp(cos(x)**2/sin(x)**2) == 1/tan(x)**2 + assert trigsimp(cos(x)**10/sin(x)**10) == 1/tan(x)**10 + + assert trigsimp(tan(x)) == trigsimp(sin(x)/cos(x)) + + +def test_issue_4661(): + a, x, y = symbols('a x y') + eq = -4*sin(x)**4 + 4*cos(x)**4 - 8*cos(x)**2 + assert trigsimp(eq) == -4 + n = sin(x)**6 + 4*sin(x)**4*cos(x)**2 + 5*sin(x)**2*cos(x)**4 + 2*cos(x)**6 + d = -sin(x)**2 - 2*cos(x)**2 + assert simplify(n/d) == -1 + assert trigsimp(-2*cos(x)**2 + cos(x)**4 - sin(x)**4) == -1 + eq = (- sin(x)**3/4)*cos(x) + (cos(x)**3/4)*sin(x) - sin(2*x)*cos(2*x)/8 + assert trigsimp(eq) == 0 + + +def test_issue_4494(): + a, b = symbols('a b') + eq = sin(a)**2*sin(b)**2 + cos(a)**2*cos(b)**2*tan(a)**2 + cos(a)**2 + assert trigsimp(eq) == 1 + + +def test_issue_5948(): + a, x, y = symbols('a x y') + assert trigsimp(diff(integrate(cos(x)/sin(x)**7, x), x)) == \ + cos(x)/sin(x)**7 + + +def test_issue_4775(): + a, x, y = symbols('a x y') + assert trigsimp(sin(x)*cos(y)+cos(x)*sin(y)) == sin(x + y) + assert trigsimp(sin(x)*cos(y)+cos(x)*sin(y)+3) == sin(x + y) + 3 + + +def test_issue_4280(): + a, x, y = symbols('a x y') + assert trigsimp(cos(x)**2 + cos(y)**2*sin(x)**2 + sin(y)**2*sin(x)**2) == 1 + assert trigsimp(a**2*sin(x)**2 + a**2*cos(y)**2*cos(x)**2 + a**2*cos(x)**2*sin(y)**2) == a**2 + assert trigsimp(a**2*cos(y)**2*sin(x)**2 + a**2*sin(y)**2*sin(x)**2) == a**2*sin(x)**2 + + +def test_issue_3210(): + eqs = (sin(2)*cos(3) + sin(3)*cos(2), + -sin(2)*sin(3) + cos(2)*cos(3), + sin(2)*cos(3) - sin(3)*cos(2), + sin(2)*sin(3) + cos(2)*cos(3), + sin(2)*sin(3) + cos(2)*cos(3) + cos(2), + sinh(2)*cosh(3) + sinh(3)*cosh(2), + sinh(2)*sinh(3) + cosh(2)*cosh(3), + ) + assert [trigsimp(e) for e in eqs] == [ + sin(5), + cos(5), + -sin(1), + cos(1), + cos(1) + cos(2), + sinh(5), + cosh(5), + ] + + +def test_trigsimp_issues(): + a, x, y = symbols('a x y') + + # issue 4625 - factor_terms works, too + assert trigsimp(sin(x)**3 + cos(x)**2*sin(x)) == sin(x) + + # issue 5948 + assert trigsimp(diff(integrate(cos(x)/sin(x)**3, x), x)) == \ + cos(x)/sin(x)**3 + assert trigsimp(diff(integrate(sin(x)/cos(x)**3, x), x)) == \ + sin(x)/cos(x)**3 + + # check integer exponents + e = sin(x)**y/cos(x)**y + assert trigsimp(e) == e + assert trigsimp(e.subs(y, 2)) == tan(x)**2 + assert trigsimp(e.subs(x, 1)) == tan(1)**y + + # check for multiple patterns + assert (cos(x)**2/sin(x)**2*cos(y)**2/sin(y)**2).trigsimp() == \ + 1/tan(x)**2/tan(y)**2 + assert trigsimp(cos(x)/sin(x)*cos(x+y)/sin(x+y)) == \ + 1/(tan(x)*tan(x + y)) + + eq = cos(2)*(cos(3) + 1)**2/(cos(3) - 1)**2 + assert trigsimp(eq) == eq.factor() # factor makes denom (-1 + cos(3))**2 + assert trigsimp(cos(2)*(cos(3) + 1)**2*(cos(3) - 1)**2) == \ + cos(2)*sin(3)**4 + + # issue 6789; this generates an expression that formerly caused + # trigsimp to hang + assert cot(x).equals(tan(x)) is False + + # nan or the unchanged expression is ok, but not sin(1) + z = cos(x)**2 + sin(x)**2 - 1 + z1 = tan(x)**2 - 1/cot(x)**2 + n = (1 + z1/z) + assert trigsimp(sin(n)) != sin(1) + eq = x*(n - 1) - x*n + assert trigsimp(eq) is S.NaN + assert trigsimp(eq, recursive=True) is S.NaN + assert trigsimp(1).is_Integer + + assert trigsimp(-sin(x)**4 - 2*sin(x)**2*cos(x)**2 - cos(x)**4) == -1 + + +def test_trigsimp_issue_2515(): + x = Symbol('x') + assert trigsimp(x*cos(x)*tan(x)) == x*sin(x) + assert trigsimp(-sin(x) + cos(x)*tan(x)) == 0 + + +def test_trigsimp_issue_3826(): + assert trigsimp(tan(2*x).expand(trig=True)) == tan(2*x) + + +def test_trigsimp_issue_4032(): + n = Symbol('n', integer=True, positive=True) + assert trigsimp(2**(n/2)*cos(pi*n/4)/2 + 2**(n - 1)/2) == \ + 2**(n/2)*cos(pi*n/4)/2 + 2**n/4 + + +def test_trigsimp_issue_7761(): + assert trigsimp(cosh(pi/4)) == cosh(pi/4) + + +def test_trigsimp_noncommutative(): + x, y = symbols('x,y') + A, B = symbols('A,B', commutative=False) + + assert trigsimp(A - A*sin(x)**2) == A*cos(x)**2 + assert trigsimp(A - A*cos(x)**2) == A*sin(x)**2 + assert trigsimp(A*sin(x)**2 + A*cos(x)**2) == A + assert trigsimp(A + A*tan(x)**2) == A/cos(x)**2 + assert trigsimp(A/cos(x)**2 - A) == A*tan(x)**2 + assert trigsimp(A/cos(x)**2 - A*tan(x)**2) == A + assert trigsimp(A + A*cot(x)**2) == A/sin(x)**2 + assert trigsimp(A/sin(x)**2 - A) == A/tan(x)**2 + assert trigsimp(A/sin(x)**2 - A*cot(x)**2) == A + + assert trigsimp(y*A*cos(x)**2 + y*A*sin(x)**2) == y*A + + assert trigsimp(A*sin(x)/cos(x)) == A*tan(x) + assert trigsimp(A*tan(x)*cos(x)) == A*sin(x) + assert trigsimp(A*cot(x)**3*sin(x)**3) == A*cos(x)**3 + assert trigsimp(y*A*tan(x)**2/sin(x)**2) == y*A/cos(x)**2 + assert trigsimp(A*cot(x)/cos(x)) == A/sin(x) + + assert trigsimp(A*sin(x + y) + A*sin(x - y)) == 2*A*sin(x)*cos(y) + assert trigsimp(A*sin(x + y) - A*sin(x - y)) == 2*A*sin(y)*cos(x) + assert trigsimp(A*cos(x + y) + A*cos(x - y)) == 2*A*cos(x)*cos(y) + assert trigsimp(A*cos(x + y) - A*cos(x - y)) == -2*A*sin(x)*sin(y) + + assert trigsimp(A*sinh(x + y) + A*sinh(x - y)) == 2*A*sinh(x)*cosh(y) + assert trigsimp(A*sinh(x + y) - A*sinh(x - y)) == 2*A*sinh(y)*cosh(x) + assert trigsimp(A*cosh(x + y) + A*cosh(x - y)) == 2*A*cosh(x)*cosh(y) + assert trigsimp(A*cosh(x + y) - A*cosh(x - y)) == 2*A*sinh(x)*sinh(y) + + assert trigsimp(A*cos(0.12345)**2 + A*sin(0.12345)**2) == 1.0*A + + +def test_hyperbolic_simp(): + x, y = symbols('x,y') + + assert trigsimp(sinh(x)**2 + 1) == cosh(x)**2 + assert trigsimp(cosh(x)**2 - 1) == sinh(x)**2 + assert trigsimp(cosh(x)**2 - sinh(x)**2) == 1 + assert trigsimp(1 - tanh(x)**2) == 1/cosh(x)**2 + assert trigsimp(1 - 1/cosh(x)**2) == tanh(x)**2 + assert trigsimp(tanh(x)**2 + 1/cosh(x)**2) == 1 + assert trigsimp(coth(x)**2 - 1) == 1/sinh(x)**2 + assert trigsimp(1/sinh(x)**2 + 1) == 1/tanh(x)**2 + assert trigsimp(coth(x)**2 - 1/sinh(x)**2) == 1 + + assert trigsimp(5*cosh(x)**2 - 5*sinh(x)**2) == 5 + assert trigsimp(5*cosh(x/2)**2 - 2*sinh(x/2)**2) == 3*cosh(x)/2 + Rational(7, 2) + + assert trigsimp(sinh(x)/cosh(x)) == tanh(x) + assert trigsimp(tanh(x)) == trigsimp(sinh(x)/cosh(x)) + assert trigsimp(cosh(x)/sinh(x)) == 1/tanh(x) + assert trigsimp(2*tanh(x)*cosh(x)) == 2*sinh(x) + assert trigsimp(coth(x)**3*sinh(x)**3) == cosh(x)**3 + assert trigsimp(y*tanh(x)**2/sinh(x)**2) == y/cosh(x)**2 + assert trigsimp(coth(x)/cosh(x)) == 1/sinh(x) + + for a in (pi/6*I, pi/4*I, pi/3*I): + assert trigsimp(sinh(a)*cosh(x) + cosh(a)*sinh(x)) == sinh(x + a) + assert trigsimp(-sinh(a)*cosh(x) + cosh(a)*sinh(x)) == sinh(x - a) + + e = 2*cosh(x)**2 - 2*sinh(x)**2 + assert trigsimp(log(e)) == log(2) + + # issue 19535: + assert trigsimp(sqrt(cosh(x)**2 - 1)) == sqrt(sinh(x)**2) + + assert trigsimp(cosh(x)**2*cosh(y)**2 - cosh(x)**2*sinh(y)**2 - sinh(x)**2, + recursive=True) == 1 + assert trigsimp(sinh(x)**2*sinh(y)**2 - sinh(x)**2*cosh(y)**2 + cosh(x)**2, + recursive=True) == 1 + + assert abs(trigsimp(2.0*cosh(x)**2 - 2.0*sinh(x)**2) - 2.0) < 1e-10 + + assert trigsimp(sinh(x)**2/cosh(x)**2) == tanh(x)**2 + assert trigsimp(sinh(x)**3/cosh(x)**3) == tanh(x)**3 + assert trigsimp(sinh(x)**10/cosh(x)**10) == tanh(x)**10 + assert trigsimp(cosh(x)**3/sinh(x)**3) == 1/tanh(x)**3 + + assert trigsimp(cosh(x)/sinh(x)) == 1/tanh(x) + assert trigsimp(cosh(x)**2/sinh(x)**2) == 1/tanh(x)**2 + assert trigsimp(cosh(x)**10/sinh(x)**10) == 1/tanh(x)**10 + + assert trigsimp(x*cosh(x)*tanh(x)) == x*sinh(x) + assert trigsimp(-sinh(x) + cosh(x)*tanh(x)) == 0 + + assert tan(x) != 1/cot(x) # cot doesn't auto-simplify + + assert trigsimp(tan(x) - 1/cot(x)) == 0 + assert trigsimp(3*tanh(x)**7 - 2/coth(x)**7) == tanh(x)**7 + + +def test_trigsimp_groebner(): + from sympy.simplify.trigsimp import trigsimp_groebner + + c = cos(x) + s = sin(x) + ex = (4*s*c + 12*s + 5*c**3 + 21*c**2 + 23*c + 15)/( + -s*c**2 + 2*s*c + 15*s + 7*c**3 + 31*c**2 + 37*c + 21) + resnum = (5*s - 5*c + 1) + resdenom = (8*s - 6*c) + results = [resnum/resdenom, (-resnum)/(-resdenom)] + assert trigsimp_groebner(ex) in results + assert trigsimp_groebner(s/c, hints=[tan]) == tan(x) + assert trigsimp_groebner(c*s) == c*s + assert trigsimp((-s + 1)/c + c/(-s + 1), + method='groebner') == 2/c + assert trigsimp((-s + 1)/c + c/(-s + 1), + method='groebner', polynomial=True) == 2/c + + # Test quick=False works + assert trigsimp_groebner(ex, hints=[2]) in results + assert trigsimp_groebner(ex, hints=[int(2)]) in results + + # test "I" + assert trigsimp_groebner(sin(I*x)/cos(I*x), hints=[tanh]) == I*tanh(x) + + # test hyperbolic / sums + assert trigsimp_groebner((tanh(x)+tanh(y))/(1+tanh(x)*tanh(y)), + hints=[(tanh, x, y)]) == tanh(x + y) + + +def test_issue_2827_trigsimp_methods(): + measure1 = lambda expr: len(str(expr)) + measure2 = lambda expr: -count_ops(expr) + # Return the most complicated result + expr = (x + 1)/(x + sin(x)**2 + cos(x)**2) + ans = Matrix([1]) + M = Matrix([expr]) + assert trigsimp(M, method='fu', measure=measure1) == ans + assert trigsimp(M, method='fu', measure=measure2) != ans + # all methods should work with Basic expressions even if they + # aren't Expr + M = Matrix.eye(1) + assert all(trigsimp(M, method=m) == M for m in + 'fu matching groebner old'.split()) + # watch for E in exptrigsimp, not only exp() + eq = 1/sqrt(E) + E + assert exptrigsimp(eq) == eq + +def test_issue_15129_trigsimp_methods(): + t1 = Matrix([sin(Rational(1, 50)), cos(Rational(1, 50)), 0]) + t2 = Matrix([sin(Rational(1, 25)), cos(Rational(1, 25)), 0]) + t3 = Matrix([cos(Rational(1, 25)), sin(Rational(1, 25)), 0]) + r1 = t1.dot(t2) + r2 = t1.dot(t3) + assert trigsimp(r1) == cos(Rational(1, 50)) + assert trigsimp(r2) == sin(Rational(3, 50)) + +def test_exptrigsimp(): + def valid(a, b): + from sympy.core.random import verify_numerically as tn + if not (tn(a, b) and a == b): + return False + return True + + assert exptrigsimp(exp(x) + exp(-x)) == 2*cosh(x) + assert exptrigsimp(exp(x) - exp(-x)) == 2*sinh(x) + assert exptrigsimp((2*exp(x)-2*exp(-x))/(exp(x)+exp(-x))) == 2*tanh(x) + assert exptrigsimp((2*exp(2*x)-2)/(exp(2*x)+1)) == 2*tanh(x) + e = [cos(x) + I*sin(x), cos(x) - I*sin(x), + cosh(x) - sinh(x), cosh(x) + sinh(x)] + ok = [exp(I*x), exp(-I*x), exp(-x), exp(x)] + assert all(valid(i, j) for i, j in zip( + [exptrigsimp(ei) for ei in e], ok)) + + ue = [cos(x) + sin(x), cos(x) - sin(x), + cosh(x) + I*sinh(x), cosh(x) - I*sinh(x)] + assert [exptrigsimp(ei) == ei for ei in ue] + + res = [] + ok = [y*tanh(1), 1/(y*tanh(1)), I*y*tan(1), -I/(y*tan(1)), + y*tanh(x), 1/(y*tanh(x)), I*y*tan(x), -I/(y*tan(x)), + y*tanh(1 + I), 1/(y*tanh(1 + I))] + for a in (1, I, x, I*x, 1 + I): + w = exp(a) + eq = y*(w - 1/w)/(w + 1/w) + res.append(simplify(eq)) + res.append(simplify(1/eq)) + assert all(valid(i, j) for i, j in zip(res, ok)) + + for a in range(1, 3): + w = exp(a) + e = w + 1/w + s = simplify(e) + assert s == exptrigsimp(e) + assert valid(s, 2*cosh(a)) + e = w - 1/w + s = simplify(e) + assert s == exptrigsimp(e) + assert valid(s, 2*sinh(a)) + +def test_exptrigsimp_noncommutative(): + a,b = symbols('a b', commutative=False) + x = Symbol('x', commutative=True) + assert exp(a + x) == exptrigsimp(exp(a)*exp(x)) + p = exp(a)*exp(b) - exp(b)*exp(a) + assert p == exptrigsimp(p) != 0 + +def test_powsimp_on_numbers(): + assert 2**(Rational(1, 3) - 2) == 2**Rational(1, 3)/4 + + +@XFAIL +def test_issue_6811_fail(): + # from doc/src/modules/physics/mechanics/examples.rst, the current `eq` + # at Line 576 (in different variables) was formerly the equivalent and + # shorter expression given below...it would be nice to get the short one + # back again + xp, y, x, z = symbols('xp, y, x, z') + eq = 4*(-19*sin(x)*y + 5*sin(3*x)*y + 15*cos(2*x)*z - 21*z)*xp/(9*cos(x) - 5*cos(3*x)) + assert trigsimp(eq) == -2*(2*cos(x)*tan(x)*y + 3*z)*xp/cos(x) + + +def test_Piecewise(): + e1 = x*(x + y) - y*(x + y) + e2 = sin(x)**2 + cos(x)**2 + e3 = expand((x + y)*y/x) + # s1 = simplify(e1) + s2 = simplify(e2) + # s3 = simplify(e3) + + # trigsimp tries not to touch non-trig containing args + assert trigsimp(Piecewise((e1, e3 < e2), (e3, True))) == \ + Piecewise((e1, e3 < s2), (e3, True)) + + +def test_issue_21594(): + assert simplify(exp(Rational(1,2)) + exp(Rational(-1,2))) == cosh(S.Half)*2 + + +def test_trigsimp_old(): + x, y = symbols('x,y') + + assert trigsimp(1 - sin(x)**2, old=True) == cos(x)**2 + assert trigsimp(1 - cos(x)**2, old=True) == sin(x)**2 + assert trigsimp(sin(x)**2 + cos(x)**2, old=True) == 1 + assert trigsimp(1 + tan(x)**2, old=True) == 1/cos(x)**2 + assert trigsimp(1/cos(x)**2 - 1, old=True) == tan(x)**2 + assert trigsimp(1/cos(x)**2 - tan(x)**2, old=True) == 1 + assert trigsimp(1 + cot(x)**2, old=True) == 1/sin(x)**2 + assert trigsimp(1/sin(x)**2 - cot(x)**2, old=True) == 1 + + assert trigsimp(5*cos(x)**2 + 5*sin(x)**2, old=True) == 5 + + assert trigsimp(sin(x)/cos(x), old=True) == tan(x) + assert trigsimp(2*tan(x)*cos(x), old=True) == 2*sin(x) + assert trigsimp(cot(x)**3*sin(x)**3, old=True) == cos(x)**3 + assert trigsimp(y*tan(x)**2/sin(x)**2, old=True) == y/cos(x)**2 + assert trigsimp(cot(x)/cos(x), old=True) == 1/sin(x) + + assert trigsimp(sin(x + y) + sin(x - y), old=True) == 2*sin(x)*cos(y) + assert trigsimp(sin(x + y) - sin(x - y), old=True) == 2*sin(y)*cos(x) + assert trigsimp(cos(x + y) + cos(x - y), old=True) == 2*cos(x)*cos(y) + assert trigsimp(cos(x + y) - cos(x - y), old=True) == -2*sin(x)*sin(y) + + assert trigsimp(sinh(x + y) + sinh(x - y), old=True) == 2*sinh(x)*cosh(y) + assert trigsimp(sinh(x + y) - sinh(x - y), old=True) == 2*sinh(y)*cosh(x) + assert trigsimp(cosh(x + y) + cosh(x - y), old=True) == 2*cosh(x)*cosh(y) + assert trigsimp(cosh(x + y) - cosh(x - y), old=True) == 2*sinh(x)*sinh(y) + + assert trigsimp(cos(0.12345)**2 + sin(0.12345)**2, old=True) == 1.0 + + assert trigsimp(sin(x)/cos(x), old=True, method='combined') == tan(x) + assert trigsimp(sin(x)/cos(x), old=True, method='groebner') == sin(x)/cos(x) + assert trigsimp(sin(x)/cos(x), old=True, method='groebner', hints=[tan]) == tan(x) + + assert trigsimp(1-sin(sin(x)**2+cos(x)**2)**2, old=True, deep=True) == cos(1)**2 + + +def test_trigsimp_inverse(): + alpha = symbols('alpha') + s, c = sin(alpha), cos(alpha) + + for finv in [asin, acos, asec, acsc, atan, acot]: + f = finv.inverse(None) + assert alpha == trigsimp(finv(f(alpha)), inverse=True) + + # test atan2(cos, sin), atan2(sin, cos), etc... + for a, b in [[c, s], [s, c]]: + for i, j in product([-1, 1], repeat=2): + angle = atan2(i*b, j*a) + angle_inverted = trigsimp(angle, inverse=True) + assert angle_inverted != angle # assures simplification happened + assert sin(angle_inverted) == trigsimp(sin(angle)) + assert cos(angle_inverted) == trigsimp(cos(angle)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/traversaltools.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/traversaltools.py new file mode 100644 index 0000000000000000000000000000000000000000..75b0bd0d8fd198cb12640ab8a0fe63a23c81ed8f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/traversaltools.py @@ -0,0 +1,15 @@ +from sympy.core.traversal import use as _use +from sympy.utilities.decorator import deprecated + +use = deprecated( + """ + Using use from the sympy.simplify.traversaltools submodule is + deprecated. + + Instead, use use from the top-level sympy namespace, like + + sympy.use + """, + deprecated_since_version="1.10", + active_deprecations_target="deprecated-traversal-functions-moved" +)(_use) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/trigsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/trigsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..fe5be1444a4625e4b63b339877e441d12cfbe8de --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/simplify/trigsimp.py @@ -0,0 +1,1252 @@ +from collections import defaultdict +from functools import reduce + +from sympy.core import (sympify, Basic, S, Expr, factor_terms, + Mul, Add, bottom_up) +from sympy.core.cache import cacheit +from sympy.core.function import (count_ops, _mexpand, FunctionClass, expand, + expand_mul, _coeff_isneg, Derivative) +from sympy.core.numbers import I, Integer +from sympy.core.intfunc import igcd +from sympy.core.sorting import _nodes +from sympy.core.symbol import Dummy, symbols, Wild +from sympy.external.gmpy import SYMPY_INTS +from sympy.functions import sin, cos, exp, cosh, tanh, sinh, tan, cot, coth +from sympy.functions import atan2 +from sympy.functions.elementary.hyperbolic import HyperbolicFunction +from sympy.functions.elementary.trigonometric import TrigonometricFunction +from sympy.polys import Poly, factor, cancel, parallel_poly_from_expr +from sympy.polys.domains import ZZ +from sympy.polys.polyerrors import PolificationFailed +from sympy.polys.polytools import groebner +from sympy.simplify.cse_main import cse +from sympy.strategies.core import identity +from sympy.strategies.tree import greedy +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import debug + +def trigsimp_groebner(expr, hints=[], quick=False, order="grlex", + polynomial=False): + """ + Simplify trigonometric expressions using a groebner basis algorithm. + + Explanation + =========== + + This routine takes a fraction involving trigonometric or hyperbolic + expressions, and tries to simplify it. The primary metric is the + total degree. Some attempts are made to choose the simplest possible + expression of the minimal degree, but this is non-rigorous, and also + very slow (see the ``quick=True`` option). + + If ``polynomial`` is set to True, instead of simplifying numerator and + denominator together, this function just brings numerator and denominator + into a canonical form. This is much faster, but has potentially worse + results. However, if the input is a polynomial, then the result is + guaranteed to be an equivalent polynomial of minimal degree. + + The most important option is hints. Its entries can be any of the + following: + + - a natural number + - a function + - an iterable of the form (func, var1, var2, ...) + - anything else, interpreted as a generator + + A number is used to indicate that the search space should be increased. + A function is used to indicate that said function is likely to occur in a + simplified expression. + An iterable is used indicate that func(var1 + var2 + ...) is likely to + occur in a simplified . + An additional generator also indicates that it is likely to occur. + (See examples below). + + This routine carries out various computationally intensive algorithms. + The option ``quick=True`` can be used to suppress one particularly slow + step (at the expense of potentially more complicated results, but never at + the expense of increased total degree). + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import sin, tan, cos, sinh, cosh, tanh + >>> from sympy.simplify.trigsimp import trigsimp_groebner + + Suppose you want to simplify ``sin(x)*cos(x)``. Naively, nothing happens: + + >>> ex = sin(x)*cos(x) + >>> trigsimp_groebner(ex) + sin(x)*cos(x) + + This is because ``trigsimp_groebner`` only looks for a simplification + involving just ``sin(x)`` and ``cos(x)``. You can tell it to also try + ``2*x`` by passing ``hints=[2]``: + + >>> trigsimp_groebner(ex, hints=[2]) + sin(2*x)/2 + >>> trigsimp_groebner(sin(x)**2 - cos(x)**2, hints=[2]) + -cos(2*x) + + Increasing the search space this way can quickly become expensive. A much + faster way is to give a specific expression that is likely to occur: + + >>> trigsimp_groebner(ex, hints=[sin(2*x)]) + sin(2*x)/2 + + Hyperbolic expressions are similarly supported: + + >>> trigsimp_groebner(sinh(2*x)/sinh(x)) + 2*cosh(x) + + Note how no hints had to be passed, since the expression already involved + ``2*x``. + + The tangent function is also supported. You can either pass ``tan`` in the + hints, to indicate that tan should be tried whenever cosine or sine are, + or you can pass a specific generator: + + >>> trigsimp_groebner(sin(x)/cos(x), hints=[tan]) + tan(x) + >>> trigsimp_groebner(sinh(x)/cosh(x), hints=[tanh(x)]) + tanh(x) + + Finally, you can use the iterable form to suggest that angle sum formulae + should be tried: + + >>> ex = (tan(x) + tan(y))/(1 - tan(x)*tan(y)) + >>> trigsimp_groebner(ex, hints=[(tan, x, y)]) + tan(x + y) + """ + # TODO + # - preprocess by replacing everything by funcs we can handle + # - optionally use cot instead of tan + # - more intelligent hinting. + # For example, if the ideal is small, and we have sin(x), sin(y), + # add sin(x + y) automatically... ? + # - algebraic numbers ... + # - expressions of lowest degree are not distinguished properly + # e.g. 1 - sin(x)**2 + # - we could try to order the generators intelligently, so as to influence + # which monomials appear in the quotient basis + + # THEORY + # ------ + # Ratsimpmodprime above can be used to "simplify" a rational function + # modulo a prime ideal. "Simplify" mainly means finding an equivalent + # expression of lower total degree. + # + # We intend to use this to simplify trigonometric functions. To do that, + # we need to decide (a) which ring to use, and (b) modulo which ideal to + # simplify. In practice, (a) means settling on a list of "generators" + # a, b, c, ..., such that the fraction we want to simplify is a rational + # function in a, b, c, ..., with coefficients in ZZ (integers). + # (2) means that we have to decide what relations to impose on the + # generators. There are two practical problems: + # (1) The ideal has to be *prime* (a technical term). + # (2) The relations have to be polynomials in the generators. + # + # We typically have two kinds of generators: + # - trigonometric expressions, like sin(x), cos(5*x), etc + # - "everything else", like gamma(x), pi, etc. + # + # Since this function is trigsimp, we will concentrate on what to do with + # trigonometric expressions. We can also simplify hyperbolic expressions, + # but the extensions should be clear. + # + # One crucial point is that all *other* generators really should behave + # like indeterminates. In particular if (say) "I" is one of them, then + # in fact I**2 + 1 = 0 and we may and will compute non-sensical + # expressions. However, we can work with a dummy and add the relation + # I**2 + 1 = 0 to our ideal, then substitute back in the end. + # + # Now regarding trigonometric generators. We split them into groups, + # according to the argument of the trigonometric functions. We want to + # organise this in such a way that most trigonometric identities apply in + # the same group. For example, given sin(x), cos(2*x) and cos(y), we would + # group as [sin(x), cos(2*x)] and [cos(y)]. + # + # Our prime ideal will be built in three steps: + # (1) For each group, compute a "geometrically prime" ideal of relations. + # Geometrically prime means that it generates a prime ideal in + # CC[gens], not just ZZ[gens]. + # (2) Take the union of all the generators of the ideals for all groups. + # By the geometric primality condition, this is still prime. + # (3) Add further inter-group relations which preserve primality. + # + # Step (1) works as follows. We will isolate common factors in the + # argument, so that all our generators are of the form sin(n*x), cos(n*x) + # or tan(n*x), with n an integer. Suppose first there are no tan terms. + # The ideal [sin(x)**2 + cos(x)**2 - 1] is geometrically prime, since + # X**2 + Y**2 - 1 is irreducible over CC. + # Now, if we have a generator sin(n*x), than we can, using trig identities, + # express sin(n*x) as a polynomial in sin(x) and cos(x). We can add this + # relation to the ideal, preserving geometric primality, since the quotient + # ring is unchanged. + # Thus we have treated all sin and cos terms. + # For tan(n*x), we add a relation tan(n*x)*cos(n*x) - sin(n*x) = 0. + # (This requires of course that we already have relations for cos(n*x) and + # sin(n*x).) It is not obvious, but it seems that this preserves geometric + # primality. + # XXX A real proof would be nice. HELP! + # Sketch that is a prime ideal of + # CC[S, C, T]: + # - it suffices to show that the projective closure in CP**3 is + # irreducible + # - using the half-angle substitutions, we can express sin(x), tan(x), + # cos(x) as rational functions in tan(x/2) + # - from this, we get a rational map from CP**1 to our curve + # - this is a morphism, hence the curve is prime + # + # Step (2) is trivial. + # + # Step (3) works by adding selected relations of the form + # sin(x + y) - sin(x)*cos(y) - sin(y)*cos(x), etc. Geometric primality is + # preserved by the same argument as before. + + def parse_hints(hints): + """Split hints into (n, funcs, iterables, gens).""" + n = 1 + funcs, iterables, gens = [], [], [] + for e in hints: + if isinstance(e, (SYMPY_INTS, Integer)): + n = e + elif isinstance(e, FunctionClass): + funcs.append(e) + elif iterable(e): + iterables.append((e[0], e[1:])) + # XXX sin(x+2y)? + # Note: we go through polys so e.g. + # sin(-x) -> -sin(x) -> sin(x) + gens.extend(parallel_poly_from_expr( + [e[0](x) for x in e[1:]] + [e[0](Add(*e[1:]))])[1].gens) + else: + gens.append(e) + return n, funcs, iterables, gens + + def build_ideal(x, terms): + """ + Build generators for our ideal. ``Terms`` is an iterable with elements of + the form (fn, coeff), indicating that we have a generator fn(coeff*x). + + If any of the terms is trigonometric, sin(x) and cos(x) are guaranteed + to appear in terms. Similarly for hyperbolic functions. For tan(n*x), + sin(n*x) and cos(n*x) are guaranteed. + """ + I = [] + y = Dummy('y') + for fn, coeff in terms: + for c, s, t, rel in ( + [cos, sin, tan, cos(x)**2 + sin(x)**2 - 1], + [cosh, sinh, tanh, cosh(x)**2 - sinh(x)**2 - 1]): + if coeff == 1 and fn in [c, s]: + I.append(rel) + elif fn == t: + I.append(t(coeff*x)*c(coeff*x) - s(coeff*x)) + elif fn in [c, s]: + cn = fn(coeff*y).expand(trig=True).subs(y, x) + I.append(fn(coeff*x) - cn) + return list(set(I)) + + def analyse_gens(gens, hints): + """ + Analyse the generators ``gens``, using the hints ``hints``. + + The meaning of ``hints`` is described in the main docstring. + Return a new list of generators, and also the ideal we should + work with. + """ + # First parse the hints + n, funcs, iterables, extragens = parse_hints(hints) + debug('n=%s funcs: %s iterables: %s extragens: %s', + (funcs, iterables, extragens)) + + # We just add the extragens to gens and analyse them as before + gens = list(gens) + gens.extend(extragens) + + # remove duplicates + funcs = list(set(funcs)) + iterables = list(set(iterables)) + gens = list(set(gens)) + + # all the functions we can do anything with + allfuncs = {sin, cos, tan, sinh, cosh, tanh} + # sin(3*x) -> ((3, x), sin) + trigterms = [(g.args[0].as_coeff_mul(), g.func) for g in gens + if g.func in allfuncs] + # Our list of new generators - start with anything that we cannot + # work with (i.e. is not a trigonometric term) + freegens = [g for g in gens if g.func not in allfuncs] + newgens = [] + trigdict = {} + for (coeff, var), fn in trigterms: + trigdict.setdefault(var, []).append((coeff, fn)) + res = [] # the ideal + + for key, val in trigdict.items(): + # We have now assembeled a dictionary. Its keys are common + # arguments in trigonometric expressions, and values are lists of + # pairs (fn, coeff). x0, (fn, coeff) in trigdict means that we + # need to deal with fn(coeff*x0). We take the rational gcd of the + # coeffs, call it ``gcd``. We then use x = x0/gcd as "base symbol", + # all other arguments are integral multiples thereof. + # We will build an ideal which works with sin(x), cos(x). + # If hint tan is provided, also work with tan(x). Moreover, if + # n > 1, also work with sin(k*x) for k <= n, and similarly for cos + # (and tan if the hint is provided). Finally, any generators which + # the ideal does not work with but we need to accommodate (either + # because it was in expr or because it was provided as a hint) + # we also build into the ideal. + # This selection process is expressed in the list ``terms``. + # build_ideal then generates the actual relations in our ideal, + # from this list. + fns = [x[1] for x in val] + val = [x[0] for x in val] + gcd = reduce(igcd, val) + terms = [(fn, v/gcd) for (fn, v) in zip(fns, val)] + fs = set(funcs + fns) + for c, s, t in ([cos, sin, tan], [cosh, sinh, tanh]): + if any(x in fs for x in (c, s, t)): + fs.add(c) + fs.add(s) + for fn in fs: + terms.extend((fn, k) for k in range(1, n + 1)) + extra = [] + for fn, v in terms: + if fn == tan: + extra.append((sin, v)) + extra.append((cos, v)) + if fn in [sin, cos] and tan in fs: + extra.append((tan, v)) + if fn == tanh: + extra.append((sinh, v)) + extra.append((cosh, v)) + if fn in [sinh, cosh] and tanh in fs: + extra.append((tanh, v)) + terms.extend(extra) + x = gcd*Mul(*key) + r = build_ideal(x, terms) + res.extend(r) + newgens.extend({fn(v*x) for fn, v in terms}) + + # Add generators for compound expressions from iterables + for fn, args in iterables: + if fn == tan: + # Tan expressions are recovered from sin and cos. + iterables.extend([(sin, args), (cos, args)]) + elif fn == tanh: + # Tanh expressions are recovered from sihn and cosh. + iterables.extend([(sinh, args), (cosh, args)]) + else: + dummys = symbols('d:%i' % len(args), cls=Dummy) + expr = fn( Add(*dummys)).expand(trig=True).subs(list(zip(dummys, args))) + res.append(fn(Add(*args)) - expr) + + if myI in gens: + res.append(myI**2 + 1) + freegens.remove(myI) + newgens.append(myI) + + return res, freegens, newgens + + myI = Dummy('I') + expr = expr.subs(S.ImaginaryUnit, myI) + subs = [(myI, S.ImaginaryUnit)] + + num, denom = cancel(expr).as_numer_denom() + try: + (pnum, pdenom), opt = parallel_poly_from_expr([num, denom]) + except PolificationFailed: + return expr + debug('initial gens:', opt.gens) + ideal, freegens, gens = analyse_gens(opt.gens, hints) + debug('ideal:', ideal) + debug('new gens:', gens, " -- len", len(gens)) + debug('free gens:', freegens, " -- len", len(gens)) + # NOTE we force the domain to be ZZ to stop polys from injecting generators + # (which is usually a sign of a bug in the way we build the ideal) + if not gens: + return expr + G = groebner(ideal, order=order, gens=gens, domain=ZZ) + debug('groebner basis:', list(G), " -- len", len(G)) + + # If our fraction is a polynomial in the free generators, simplify all + # coefficients separately: + + from sympy.simplify.ratsimp import ratsimpmodprime + + if freegens and pdenom.has_only_gens(*set(gens).intersection(pdenom.gens)): + num = Poly(num, gens=gens+freegens).eject(*gens) + res = [] + for monom, coeff in num.terms(): + ourgens = set(parallel_poly_from_expr([coeff, denom])[1].gens) + # We compute the transitive closure of all generators that can + # be reached from our generators through relations in the ideal. + changed = True + while changed: + changed = False + for p in ideal: + p = Poly(p) + if not ourgens.issuperset(p.gens) and \ + not p.has_only_gens(*set(p.gens).difference(ourgens)): + changed = True + ourgens.update(p.exclude().gens) + # NOTE preserve order! + realgens = [x for x in gens if x in ourgens] + # The generators of the ideal have now been (implicitly) split + # into two groups: those involving ourgens and those that don't. + # Since we took the transitive closure above, these two groups + # live in subgrings generated by a *disjoint* set of variables. + # Any sensible groebner basis algorithm will preserve this disjoint + # structure (i.e. the elements of the groebner basis can be split + # similarly), and and the two subsets of the groebner basis then + # form groebner bases by themselves. (For the smaller generating + # sets, of course.) + ourG = [g.as_expr() for g in G.polys if + g.has_only_gens(*ourgens.intersection(g.gens))] + res.append(Mul(*[a**b for a, b in zip(freegens, monom)]) * \ + ratsimpmodprime(coeff/denom, ourG, order=order, + gens=realgens, quick=quick, domain=ZZ, + polynomial=polynomial).subs(subs)) + return Add(*res) + # NOTE The following is simpler and has less assumptions on the + # groebner basis algorithm. If the above turns out to be broken, + # use this. + return Add(*[Mul(*[a**b for a, b in zip(freegens, monom)]) * \ + ratsimpmodprime(coeff/denom, list(G), order=order, + gens=gens, quick=quick, domain=ZZ) + for monom, coeff in num.terms()]) + else: + return ratsimpmodprime( + expr, list(G), order=order, gens=freegens+gens, + quick=quick, domain=ZZ, polynomial=polynomial).subs(subs) + + +_trigs = (TrigonometricFunction, HyperbolicFunction) + + +def _trigsimp_inverse(rv): + + def check_args(x, y): + try: + return x.args[0] == y.args[0] + except IndexError: + return False + + def f(rv): + # for simple functions + g = getattr(rv, 'inverse', None) + if (g is not None and isinstance(rv.args[0], g()) and + isinstance(g()(1), TrigonometricFunction)): + return rv.args[0].args[0] + + # for atan2 simplifications, harder because atan2 has 2 args + if isinstance(rv, atan2): + y, x = rv.args + if _coeff_isneg(y): + return -f(atan2(-y, x)) + elif _coeff_isneg(x): + return S.Pi - f(atan2(y, -x)) + + if check_args(x, y): + if isinstance(y, sin) and isinstance(x, cos): + return x.args[0] + if isinstance(y, cos) and isinstance(x, sin): + return S.Pi / 2 - x.args[0] + + return rv + + return bottom_up(rv, f) + + +def trigsimp(expr, inverse=False, **opts): + """Returns a reduced expression by using known trig identities. + + Parameters + ========== + + inverse : bool, optional + If ``inverse=True``, it will be assumed that a composition of inverse + functions, such as sin and asin, can be cancelled in any order. + For example, ``asin(sin(x))`` will yield ``x`` without checking whether + x belongs to the set where this relation is true. The default is False. + Default : True + + method : string, optional + Specifies the method to use. Valid choices are: + + - ``'matching'``, default + - ``'groebner'`` + - ``'combined'`` + - ``'fu'`` + - ``'old'`` + + If ``'matching'``, simplify the expression recursively by targeting + common patterns. If ``'groebner'``, apply an experimental groebner + basis algorithm. In this case further options are forwarded to + ``trigsimp_groebner``, please refer to + its docstring. If ``'combined'``, it first runs the groebner basis + algorithm with small default parameters, then runs the ``'matching'`` + algorithm. If ``'fu'``, run the collection of trigonometric + transformations described by Fu, et al. (see the + :py:func:`~sympy.simplify.fu.fu` docstring). If ``'old'``, the original + SymPy trig simplification function is run. + opts : + Optional keyword arguments passed to the method. See each method's + function docstring for details. + + Examples + ======== + + >>> from sympy import trigsimp, sin, cos, log + >>> from sympy.abc import x + >>> e = 2*sin(x)**2 + 2*cos(x)**2 + >>> trigsimp(e) + 2 + + Simplification occurs wherever trigonometric functions are located. + + >>> trigsimp(log(e)) + log(2) + + Using ``method='groebner'`` (or ``method='combined'``) might lead to + greater simplification. + + The old trigsimp routine can be accessed as with method ``method='old'``. + + >>> from sympy import coth, tanh + >>> t = 3*tanh(x)**7 - 2/coth(x)**7 + >>> trigsimp(t, method='old') == t + True + >>> trigsimp(t) + tanh(x)**7 + + """ + from sympy.simplify.fu import fu + + expr = sympify(expr) + + _eval_trigsimp = getattr(expr, '_eval_trigsimp', None) + if _eval_trigsimp is not None: + return _eval_trigsimp(**opts) + + old = opts.pop('old', False) + if not old: + opts.pop('deep', None) + opts.pop('recursive', None) + method = opts.pop('method', 'matching') + else: + method = 'old' + + def groebnersimp(ex, **opts): + def traverse(e): + if e.is_Atom: + return e + args = [traverse(x) for x in e.args] + if e.is_Function or e.is_Pow: + args = [trigsimp_groebner(x, **opts) for x in args] + return e.func(*args) + new = traverse(ex) + if not isinstance(new, Expr): + return new + return trigsimp_groebner(new, **opts) + + trigsimpfunc = { + 'fu': (lambda x: fu(x, **opts)), + 'matching': (lambda x: futrig(x)), + 'groebner': (lambda x: groebnersimp(x, **opts)), + 'combined': (lambda x: futrig(groebnersimp(x, + polynomial=True, hints=[2, tan]))), + 'old': lambda x: trigsimp_old(x, **opts), + }[method] + + expr_simplified = trigsimpfunc(expr) + if inverse: + expr_simplified = _trigsimp_inverse(expr_simplified) + + return expr_simplified + + +def exptrigsimp(expr): + """ + Simplifies exponential / trigonometric / hyperbolic functions. + + Examples + ======== + + >>> from sympy import exptrigsimp, exp, cosh, sinh + >>> from sympy.abc import z + + >>> exptrigsimp(exp(z) + exp(-z)) + 2*cosh(z) + >>> exptrigsimp(cosh(z) - sinh(z)) + exp(-z) + """ + from sympy.simplify.fu import hyper_as_trig, TR2i + + def exp_trig(e): + # select the better of e, and e rewritten in terms of exp or trig + # functions + choices = [e] + if e.has(*_trigs): + choices.append(e.rewrite(exp)) + choices.append(e.rewrite(cos)) + return min(*choices, key=count_ops) + newexpr = bottom_up(expr, exp_trig) + + def f(rv): + if not rv.is_Mul: + return rv + commutative_part, noncommutative_part = rv.args_cnc() + # Since as_powers_dict loses order information, + # if there is more than one noncommutative factor, + # it should only be used to simplify the commutative part. + if (len(noncommutative_part) > 1): + return f(Mul(*commutative_part))*Mul(*noncommutative_part) + rvd = rv.as_powers_dict() + newd = rvd.copy() + + def signlog(expr, sign=S.One): + if expr is S.Exp1: + return sign, S.One + elif isinstance(expr, exp) or (expr.is_Pow and expr.base == S.Exp1): + return sign, expr.exp + elif sign is S.One: + return signlog(-expr, sign=-S.One) + else: + return None, None + + ee = rvd[S.Exp1] + for k in rvd: + if k.is_Add and len(k.args) == 2: + # k == c*(1 + sign*E**x) + c = k.args[0] + sign, x = signlog(k.args[1]/c) + if not x: + continue + m = rvd[k] + newd[k] -= m + if ee == -x*m/2: + # sinh and cosh + newd[S.Exp1] -= ee + ee = 0 + if sign == 1: + newd[2*c*cosh(x/2)] += m + else: + newd[-2*c*sinh(x/2)] += m + elif newd[1 - sign*S.Exp1**x] == -m: + # tanh + del newd[1 - sign*S.Exp1**x] + if sign == 1: + newd[-c/tanh(x/2)] += m + else: + newd[-c*tanh(x/2)] += m + else: + newd[1 + sign*S.Exp1**x] += m + newd[c] += m + + return Mul(*[k**newd[k] for k in newd]) + newexpr = bottom_up(newexpr, f) + + # sin/cos and sinh/cosh ratios to tan and tanh, respectively + if newexpr.has(HyperbolicFunction): + e, f = hyper_as_trig(newexpr) + newexpr = f(TR2i(e)) + if newexpr.has(TrigonometricFunction): + newexpr = TR2i(newexpr) + + # can we ever generate an I where there was none previously? + if not (newexpr.has(I) and not expr.has(I)): + expr = newexpr + return expr + +#-------------------- the old trigsimp routines --------------------- + +def trigsimp_old(expr, *, first=True, **opts): + """ + Reduces expression by using known trig identities. + + Notes + ===== + + deep: + - Apply trigsimp inside all objects with arguments + + recursive: + - Use common subexpression elimination (cse()) and apply + trigsimp recursively (this is quite expensive if the + expression is large) + + method: + - Determine the method to use. Valid choices are 'matching' (default), + 'groebner', 'combined', 'fu' and 'futrig'. If 'matching', simplify the + expression recursively by pattern matching. If 'groebner', apply an + experimental groebner basis algorithm. In this case further options + are forwarded to ``trigsimp_groebner``, please refer to its docstring. + If 'combined', first run the groebner basis algorithm with small + default parameters, then run the 'matching' algorithm. 'fu' runs the + collection of trigonometric transformations described by Fu, et al. + (see the `fu` docstring) while `futrig` runs a subset of Fu-transforms + that mimic the behavior of `trigsimp`. + + compare: + - show input and output from `trigsimp` and `futrig` when different, + but returns the `trigsimp` value. + + Examples + ======== + + >>> from sympy import trigsimp, sin, cos, log, cot + >>> from sympy.abc import x + >>> e = 2*sin(x)**2 + 2*cos(x)**2 + >>> trigsimp(e, old=True) + 2 + >>> trigsimp(log(e), old=True) + log(2*sin(x)**2 + 2*cos(x)**2) + >>> trigsimp(log(e), deep=True, old=True) + log(2) + + Using `method="groebner"` (or `"combined"`) can sometimes lead to a lot + more simplification: + + >>> e = (-sin(x) + 1)/cos(x) + cos(x)/(-sin(x) + 1) + >>> trigsimp(e, old=True) + (1 - sin(x))/cos(x) + cos(x)/(1 - sin(x)) + >>> trigsimp(e, method="groebner", old=True) + 2/cos(x) + + >>> trigsimp(1/cot(x)**2, compare=True, old=True) + futrig: tan(x)**2 + cot(x)**(-2) + + """ + old = expr + if first: + if not expr.has(*_trigs): + return expr + + trigsyms = set().union(*[t.free_symbols for t in expr.atoms(*_trigs)]) + if len(trigsyms) > 1: + from sympy.simplify.simplify import separatevars + + d = separatevars(expr) + if d.is_Mul: + d = separatevars(d, dict=True) or d + if isinstance(d, dict): + expr = 1 + for v in d.values(): + # remove hollow factoring + was = v + v = expand_mul(v) + opts['first'] = False + vnew = trigsimp(v, **opts) + if vnew == v: + vnew = was + expr *= vnew + old = expr + else: + if d.is_Add: + for s in trigsyms: + r, e = expr.as_independent(s) + if r: + opts['first'] = False + expr = r + trigsimp(e, **opts) + if not expr.is_Add: + break + old = expr + + recursive = opts.pop('recursive', False) + deep = opts.pop('deep', False) + method = opts.pop('method', 'matching') + + def groebnersimp(ex, deep, **opts): + def traverse(e): + if e.is_Atom: + return e + args = [traverse(x) for x in e.args] + if e.is_Function or e.is_Pow: + args = [trigsimp_groebner(x, **opts) for x in args] + return e.func(*args) + if deep: + ex = traverse(ex) + return trigsimp_groebner(ex, **opts) + + trigsimpfunc = { + 'matching': (lambda x, d: _trigsimp(x, d)), + 'groebner': (lambda x, d: groebnersimp(x, d, **opts)), + 'combined': (lambda x, d: _trigsimp(groebnersimp(x, + d, polynomial=True, hints=[2, tan]), + d)) + }[method] + + if recursive: + w, g = cse(expr) + g = trigsimpfunc(g[0], deep) + + for sub in reversed(w): + g = g.subs(sub[0], sub[1]) + g = trigsimpfunc(g, deep) + result = g + else: + result = trigsimpfunc(expr, deep) + + if opts.get('compare', False): + f = futrig(old) + if f != result: + print('\tfutrig:', f) + + return result + + +def _dotrig(a, b): + """Helper to tell whether ``a`` and ``b`` have the same sorts + of symbols in them -- no need to test hyperbolic patterns against + expressions that have no hyperbolics in them.""" + return a.func == b.func and ( + a.has(TrigonometricFunction) and b.has(TrigonometricFunction) or + a.has(HyperbolicFunction) and b.has(HyperbolicFunction)) + + +_trigpat = None +def _trigpats(): + global _trigpat + a, b, c = symbols('a b c', cls=Wild) + d = Wild('d', commutative=False) + + # for the simplifications like sinh/cosh -> tanh: + # DO NOT REORDER THE FIRST 14 since these are assumed to be in this + # order in _match_div_rewrite. + matchers_division = ( + (a*sin(b)**c/cos(b)**c, a*tan(b)**c, sin(b), cos(b)), + (a*tan(b)**c*cos(b)**c, a*sin(b)**c, sin(b), cos(b)), + (a*cot(b)**c*sin(b)**c, a*cos(b)**c, sin(b), cos(b)), + (a*tan(b)**c/sin(b)**c, a/cos(b)**c, sin(b), cos(b)), + (a*cot(b)**c/cos(b)**c, a/sin(b)**c, sin(b), cos(b)), + (a*cot(b)**c*tan(b)**c, a, sin(b), cos(b)), + (a*(cos(b) + 1)**c*(cos(b) - 1)**c, + a*(-sin(b)**2)**c, cos(b) + 1, cos(b) - 1), + (a*(sin(b) + 1)**c*(sin(b) - 1)**c, + a*(-cos(b)**2)**c, sin(b) + 1, sin(b) - 1), + + (a*sinh(b)**c/cosh(b)**c, a*tanh(b)**c, S.One, S.One), + (a*tanh(b)**c*cosh(b)**c, a*sinh(b)**c, S.One, S.One), + (a*coth(b)**c*sinh(b)**c, a*cosh(b)**c, S.One, S.One), + (a*tanh(b)**c/sinh(b)**c, a/cosh(b)**c, S.One, S.One), + (a*coth(b)**c/cosh(b)**c, a/sinh(b)**c, S.One, S.One), + (a*coth(b)**c*tanh(b)**c, a, S.One, S.One), + + (c*(tanh(a) + tanh(b))/(1 + tanh(a)*tanh(b)), + tanh(a + b)*c, S.One, S.One), + ) + + matchers_add = ( + (c*sin(a)*cos(b) + c*cos(a)*sin(b) + d, sin(a + b)*c + d), + (c*cos(a)*cos(b) - c*sin(a)*sin(b) + d, cos(a + b)*c + d), + (c*sin(a)*cos(b) - c*cos(a)*sin(b) + d, sin(a - b)*c + d), + (c*cos(a)*cos(b) + c*sin(a)*sin(b) + d, cos(a - b)*c + d), + (c*sinh(a)*cosh(b) + c*sinh(b)*cosh(a) + d, sinh(a + b)*c + d), + (c*cosh(a)*cosh(b) + c*sinh(a)*sinh(b) + d, cosh(a + b)*c + d), + ) + + # for cos(x)**2 + sin(x)**2 -> 1 + matchers_identity = ( + (a*sin(b)**2, a - a*cos(b)**2), + (a*tan(b)**2, a*(1/cos(b))**2 - a), + (a*cot(b)**2, a*(1/sin(b))**2 - a), + (a*sin(b + c), a*(sin(b)*cos(c) + sin(c)*cos(b))), + (a*cos(b + c), a*(cos(b)*cos(c) - sin(b)*sin(c))), + (a*tan(b + c), a*((tan(b) + tan(c))/(1 - tan(b)*tan(c)))), + + (a*sinh(b)**2, a*cosh(b)**2 - a), + (a*tanh(b)**2, a - a*(1/cosh(b))**2), + (a*coth(b)**2, a + a*(1/sinh(b))**2), + (a*sinh(b + c), a*(sinh(b)*cosh(c) + sinh(c)*cosh(b))), + (a*cosh(b + c), a*(cosh(b)*cosh(c) + sinh(b)*sinh(c))), + (a*tanh(b + c), a*((tanh(b) + tanh(c))/(1 + tanh(b)*tanh(c)))), + + ) + + # Reduce any lingering artifacts, such as sin(x)**2 changing + # to 1-cos(x)**2 when sin(x)**2 was "simpler" + artifacts = ( + (a - a*cos(b)**2 + c, a*sin(b)**2 + c, cos), + (a - a*(1/cos(b))**2 + c, -a*tan(b)**2 + c, cos), + (a - a*(1/sin(b))**2 + c, -a*cot(b)**2 + c, sin), + + (a - a*cosh(b)**2 + c, -a*sinh(b)**2 + c, cosh), + (a - a*(1/cosh(b))**2 + c, a*tanh(b)**2 + c, cosh), + (a + a*(1/sinh(b))**2 + c, a*coth(b)**2 + c, sinh), + + # same as above but with noncommutative prefactor + (a*d - a*d*cos(b)**2 + c, a*d*sin(b)**2 + c, cos), + (a*d - a*d*(1/cos(b))**2 + c, -a*d*tan(b)**2 + c, cos), + (a*d - a*d*(1/sin(b))**2 + c, -a*d*cot(b)**2 + c, sin), + + (a*d - a*d*cosh(b)**2 + c, -a*d*sinh(b)**2 + c, cosh), + (a*d - a*d*(1/cosh(b))**2 + c, a*d*tanh(b)**2 + c, cosh), + (a*d + a*d*(1/sinh(b))**2 + c, a*d*coth(b)**2 + c, sinh), + ) + + _trigpat = (a, b, c, d, matchers_division, matchers_add, + matchers_identity, artifacts) + return _trigpat + + +def _replace_mul_fpowxgpow(expr, f, g, rexp, h, rexph): + """Helper for _match_div_rewrite. + + Replace f(b_)**c_*g(b_)**(rexp(c_)) with h(b)**rexph(c) if f(b_) + and g(b_) are both positive or if c_ is an integer. + """ + # assert expr.is_Mul and expr.is_commutative and f != g + fargs = defaultdict(int) + gargs = defaultdict(int) + args = [] + for x in expr.args: + if x.is_Pow or x.func in (f, g): + b, e = x.as_base_exp() + if b.is_positive or e.is_integer: + if b.func == f: + fargs[b.args[0]] += e + continue + elif b.func == g: + gargs[b.args[0]] += e + continue + args.append(x) + common = set(fargs) & set(gargs) + hit = False + while common: + key = common.pop() + fe = fargs.pop(key) + ge = gargs.pop(key) + if fe == rexp(ge): + args.append(h(key)**rexph(fe)) + hit = True + else: + fargs[key] = fe + gargs[key] = ge + if not hit: + return expr + while fargs: + key, e = fargs.popitem() + args.append(f(key)**e) + while gargs: + key, e = gargs.popitem() + args.append(g(key)**e) + return Mul(*args) + + +_idn = lambda x: x +_midn = lambda x: -x +_one = lambda x: S.One + +def _match_div_rewrite(expr, i): + """helper for __trigsimp""" + if i == 0: + expr = _replace_mul_fpowxgpow(expr, sin, cos, + _midn, tan, _idn) + elif i == 1: + expr = _replace_mul_fpowxgpow(expr, tan, cos, + _idn, sin, _idn) + elif i == 2: + expr = _replace_mul_fpowxgpow(expr, cot, sin, + _idn, cos, _idn) + elif i == 3: + expr = _replace_mul_fpowxgpow(expr, tan, sin, + _midn, cos, _midn) + elif i == 4: + expr = _replace_mul_fpowxgpow(expr, cot, cos, + _midn, sin, _midn) + elif i == 5: + expr = _replace_mul_fpowxgpow(expr, cot, tan, + _idn, _one, _idn) + # i in (6, 7) is skipped + elif i == 8: + expr = _replace_mul_fpowxgpow(expr, sinh, cosh, + _midn, tanh, _idn) + elif i == 9: + expr = _replace_mul_fpowxgpow(expr, tanh, cosh, + _idn, sinh, _idn) + elif i == 10: + expr = _replace_mul_fpowxgpow(expr, coth, sinh, + _idn, cosh, _idn) + elif i == 11: + expr = _replace_mul_fpowxgpow(expr, tanh, sinh, + _midn, cosh, _midn) + elif i == 12: + expr = _replace_mul_fpowxgpow(expr, coth, cosh, + _midn, sinh, _midn) + elif i == 13: + expr = _replace_mul_fpowxgpow(expr, coth, tanh, + _idn, _one, _idn) + else: + return None + return expr + + +def _trigsimp(expr, deep=False): + # protect the cache from non-trig patterns; we only allow + # trig patterns to enter the cache + if expr.has(*_trigs): + return __trigsimp(expr, deep) + return expr + + +@cacheit +def __trigsimp(expr, deep=False): + """recursive helper for trigsimp""" + from sympy.simplify.fu import TR10i + + if _trigpat is None: + _trigpats() + a, b, c, d, matchers_division, matchers_add, \ + matchers_identity, artifacts = _trigpat + + if expr.is_Mul: + # do some simplifications like sin/cos -> tan: + if not expr.is_commutative: + com, nc = expr.args_cnc() + expr = _trigsimp(Mul._from_args(com), deep)*Mul._from_args(nc) + else: + for i, (pattern, simp, ok1, ok2) in enumerate(matchers_division): + if not _dotrig(expr, pattern): + continue + + newexpr = _match_div_rewrite(expr, i) + if newexpr is not None: + if newexpr != expr: + expr = newexpr + break + else: + continue + + # use SymPy matching instead + res = expr.match(pattern) + if res and res.get(c, 0): + if not res[c].is_integer: + ok = ok1.subs(res) + if not ok.is_positive: + continue + ok = ok2.subs(res) + if not ok.is_positive: + continue + # if "a" contains any of trig or hyperbolic funcs with + # argument "b" then skip the simplification + if any(w.args[0] == res[b] for w in res[a].atoms( + TrigonometricFunction, HyperbolicFunction)): + continue + # simplify and finish: + expr = simp.subs(res) + break # process below + + if expr.is_Add: + args = [] + for term in expr.args: + if not term.is_commutative: + com, nc = term.args_cnc() + nc = Mul._from_args(nc) + term = Mul._from_args(com) + else: + nc = S.One + term = _trigsimp(term, deep) + for pattern, result in matchers_identity: + res = term.match(pattern) + if res is not None: + term = result.subs(res) + break + args.append(term*nc) + if args != expr.args: + expr = Add(*args) + expr = min(expr, expand(expr), key=count_ops) + if expr.is_Add: + for pattern, result in matchers_add: + if not _dotrig(expr, pattern): + continue + expr = TR10i(expr) + if expr.has(HyperbolicFunction): + res = expr.match(pattern) + # if "d" contains any trig or hyperbolic funcs with + # argument "a" or "b" then skip the simplification; + # this isn't perfect -- see tests + if res is None or not (a in res and b in res) or any( + w.args[0] in (res[a], res[b]) for w in res[d].atoms( + TrigonometricFunction, HyperbolicFunction)): + continue + expr = result.subs(res) + break + + # Reduce any lingering artifacts, such as sin(x)**2 changing + # to 1 - cos(x)**2 when sin(x)**2 was "simpler" + for pattern, result, ex in artifacts: + if not _dotrig(expr, pattern): + continue + # Substitute a new wild that excludes some function(s) + # to help influence a better match. This is because + # sometimes, for example, 'a' would match sec(x)**2 + a_t = Wild('a', exclude=[ex]) + pattern = pattern.subs(a, a_t) + result = result.subs(a, a_t) + + m = expr.match(pattern) + was = None + while m and was != expr: + was = expr + if m[a_t] == 0 or \ + -m[a_t] in m[c].args or m[a_t] + m[c] == 0: + break + if d in m and m[a_t]*m[d] + m[c] == 0: + break + expr = result.subs(m) + m = expr.match(pattern) + m.setdefault(c, S.Zero) + + elif expr.is_Mul or expr.is_Pow or deep and expr.args: + expr = expr.func(*[_trigsimp(a, deep) for a in expr.args]) + + try: + if not expr.has(*_trigs): + raise TypeError + e = expr.atoms(exp) + new = expr.rewrite(exp, deep=deep) + if new == e: + raise TypeError + fnew = factor(new) + if fnew != new: + new = min([new, factor(new)], key=count_ops) + # if all exp that were introduced disappeared then accept it + if not (new.atoms(exp) - e): + expr = new + except TypeError: + pass + + return expr +#------------------- end of old trigsimp routines -------------------- + + +def futrig(e, *, hyper=True, **kwargs): + """Return simplified ``e`` using Fu-like transformations. + This is not the "Fu" algorithm. This is called by default + from ``trigsimp``. By default, hyperbolics subexpressions + will be simplified, but this can be disabled by setting + ``hyper=False``. + + Examples + ======== + + >>> from sympy import trigsimp, tan, sinh, tanh + >>> from sympy.simplify.trigsimp import futrig + >>> from sympy.abc import x + >>> trigsimp(1/tan(x)**2) + tan(x)**(-2) + + >>> futrig(sinh(x)/tanh(x)) + cosh(x) + + """ + from sympy.simplify.fu import hyper_as_trig + + e = sympify(e) + + if not isinstance(e, Basic): + return e + + if not e.args: + return e + + old = e + e = bottom_up(e, _futrig) + + if hyper and e.has(HyperbolicFunction): + e, f = hyper_as_trig(e) + e = f(bottom_up(e, _futrig)) + + if e != old and e.is_Mul and e.args[0].is_Rational: + # redistribute leading coeff on 2-arg Add + e = Mul(*e.as_coeff_Mul()) + return e + + +def _futrig(e): + """Helper for futrig.""" + from sympy.simplify.fu import ( + TR1, TR2, TR3, TR2i, TR10, L, TR10i, + TR8, TR6, TR15, TR16, TR111, TR5, TRmorrie, TR11, _TR11, TR14, TR22, + TR12) + + if not e.has(TrigonometricFunction): + return e + + if e.is_Mul: + coeff, e = e.as_independent(TrigonometricFunction) + else: + coeff = None + + Lops = lambda x: (L(x), x.count_ops(), _nodes(x), len(x.args), x.is_Add) + trigs = lambda x: x.has(TrigonometricFunction) + + tree = [identity, + ( + TR3, # canonical angles + TR1, # sec-csc -> cos-sin + TR12, # expand tan of sum + lambda x: _eapply(factor, x, trigs), + TR2, # tan-cot -> sin-cos + [identity, lambda x: _eapply(_mexpand, x, trigs)], + TR2i, # sin-cos ratio -> tan + lambda x: _eapply(lambda i: factor(i.normal()), x, trigs), + TR14, # factored identities + TR5, # sin-pow -> cos_pow + TR10, # sin-cos of sums -> sin-cos prod + TR11, _TR11, TR6, # reduce double angles and rewrite cos pows + lambda x: _eapply(factor, x, trigs), + TR14, # factored powers of identities + [identity, lambda x: _eapply(_mexpand, x, trigs)], + TR10i, # sin-cos products > sin-cos of sums + TRmorrie, + [identity, TR8], # sin-cos products -> sin-cos of sums + [identity, lambda x: TR2i(TR2(x))], # tan -> sin-cos -> tan + [ + lambda x: _eapply(expand_mul, TR5(x), trigs), + lambda x: _eapply( + expand_mul, TR15(x), trigs)], # pos/neg powers of sin + [ + lambda x: _eapply(expand_mul, TR6(x), trigs), + lambda x: _eapply( + expand_mul, TR16(x), trigs)], # pos/neg powers of cos + TR111, # tan, sin, cos to neg power -> cot, csc, sec + [identity, TR2i], # sin-cos ratio to tan + [identity, lambda x: _eapply( + expand_mul, TR22(x), trigs)], # tan-cot to sec-csc + TR1, TR2, TR2i, + [identity, lambda x: _eapply( + factor_terms, TR12(x), trigs)], # expand tan of sum + )] + e = greedy(tree, objective=Lops)(e) + + if coeff is not None: + e = coeff * e + + return e + + +def _is_Expr(e): + """_eapply helper to tell whether ``e`` and all its args + are Exprs.""" + if isinstance(e, Derivative): + return _is_Expr(e.expr) + if not isinstance(e, Expr): + return False + return all(_is_Expr(i) for i in e.args) + + +def _eapply(func, e, cond=None): + """Apply ``func`` to ``e`` if all args are Exprs else only + apply it to those args that *are* Exprs.""" + if not isinstance(e, Expr): + return e + if _is_Expr(e) or not e.args: + return func(e) + return e.func(*[ + _eapply(func, ei) if (cond is None or cond(ei)) else ei + for ei in e.args]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..02cfb35a765c748e70ecc36dd78d8d4432118c64 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/__init__.py @@ -0,0 +1,75 @@ +"""A module for solving all kinds of equations. + + Examples + ======== + + >>> from sympy.solvers import solve + >>> from sympy.abc import x + >>> solve(((x + 1)**5).expand(), x) + [-1] +""" +from sympy.core.assumptions import check_assumptions, failing_assumptions + +from .solvers import solve, solve_linear_system, solve_linear_system_LU, \ + solve_undetermined_coeffs, nsolve, solve_linear, checksol, \ + det_quick, inv_quick + +from sympy.solvers.diophantine.diophantine import diophantine + +from .recurr import rsolve, rsolve_poly, rsolve_ratio, rsolve_hyper + +from .ode import checkodesol, classify_ode, dsolve, \ + homogeneous_order + +from .polysys import solve_poly_system, solve_triangulated, factor_system + +from .pde import pde_separate, pde_separate_add, pde_separate_mul, \ + pdsolve, classify_pde, checkpdesol + +from .deutils import ode_order + +from .inequalities import reduce_inequalities, reduce_abs_inequality, \ + reduce_abs_inequalities, solve_poly_inequality, solve_rational_inequalities, solve_univariate_inequality + +from .decompogen import decompogen + +from .solveset import solveset, linsolve, linear_eq_to_matrix, nonlinsolve, substitution + +from .simplex import lpmin, lpmax, linprog + +# This is here instead of sympy/sets/__init__.py to avoid circular import issues +from ..core.singleton import S +Complexes = S.Complexes + +__all__ = [ + 'solve', 'solve_linear_system', 'solve_linear_system_LU', + 'solve_undetermined_coeffs', 'nsolve', 'solve_linear', 'checksol', + 'det_quick', 'inv_quick', 'check_assumptions', 'failing_assumptions', + + 'diophantine', + + 'rsolve', 'rsolve_poly', 'rsolve_ratio', 'rsolve_hyper', + + 'checkodesol', 'classify_ode', 'dsolve', 'homogeneous_order', + + 'solve_poly_system', 'solve_triangulated', 'factor_system', + + 'pde_separate', 'pde_separate_add', 'pde_separate_mul', 'pdsolve', + 'classify_pde', 'checkpdesol', + + 'ode_order', + + 'reduce_inequalities', 'reduce_abs_inequality', 'reduce_abs_inequalities', + 'solve_poly_inequality', 'solve_rational_inequalities', + 'solve_univariate_inequality', + + 'decompogen', + + 'solveset', 'linsolve', 'linear_eq_to_matrix', 'nonlinsolve', + 'substitution', + + # This is here instead of sympy/sets/__init__.py to avoid circular import issues + 'Complexes', + + 'lpmin', 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b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/benchmarks/bench_solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..d18102873f7efcde1d111e0e8eca12e208f94663 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/benchmarks/bench_solvers.py @@ -0,0 +1,12 @@ +from sympy.core.symbol import Symbol +from sympy.matrices.dense import (eye, zeros) +from sympy.solvers.solvers import solve_linear_system + +N = 8 +M = zeros(N, N + 1) +M[:, :N] = eye(N) +S = [Symbol('A%i' % i) for i in range(N)] + + +def timeit_linsolve_trivial(): + solve_linear_system(M, *S) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/bivariate.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/bivariate.py new file mode 100644 index 0000000000000000000000000000000000000000..72f8e266a16634fa65366e1058543dfe2171ba1c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/bivariate.py @@ -0,0 +1,509 @@ +from sympy.core.add import Add +from sympy.core.exprtools import factor_terms +from sympy.core.function import expand_log, _mexpand +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy +from sympy.functions.elementary.exponential import (LambertW, exp, log) +from sympy.functions.elementary.miscellaneous import root +from sympy.polys.polyroots import roots +from sympy.polys.polytools import Poly, factor +from sympy.simplify.simplify import separatevars +from sympy.simplify.radsimp import collect +from sympy.simplify.simplify import powsimp +from sympy.solvers.solvers import solve, _invert +from sympy.utilities.iterables import uniq + + +def _filtered_gens(poly, symbol): + """process the generators of ``poly``, returning the set of generators that + have ``symbol``. If there are two generators that are inverses of each other, + prefer the one that has no denominator. + + Examples + ======== + + >>> from sympy.solvers.bivariate import _filtered_gens + >>> from sympy import Poly, exp + >>> from sympy.abc import x + >>> _filtered_gens(Poly(x + 1/x + exp(x)), x) + {x, exp(x)} + + """ + # TODO it would be good to pick the smallest divisible power + # instead of the base for something like x**4 + x**2 --> + # return x**2 not x + gens = {g for g in poly.gens if symbol in g.free_symbols} + for g in list(gens): + ag = 1/g + if g in gens and ag in gens: + if ag.as_numer_denom()[1] is not S.One: + g = ag + gens.remove(g) + return gens + + +def _mostfunc(lhs, func, X=None): + """Returns the term in lhs which contains the most of the + func-type things e.g. log(log(x)) wins over log(x) if both terms appear. + + ``func`` can be a function (exp, log, etc...) or any other SymPy object, + like Pow. + + If ``X`` is not ``None``, then the function returns the term composed with the + most ``func`` having the specified variable. + + Examples + ======== + + >>> from sympy.solvers.bivariate import _mostfunc + >>> from sympy import exp + >>> from sympy.abc import x, y + >>> _mostfunc(exp(x) + exp(exp(x) + 2), exp) + exp(exp(x) + 2) + >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp) + exp(exp(y) + 2) + >>> _mostfunc(exp(x) + exp(exp(y) + 2), exp, x) + exp(x) + >>> _mostfunc(x, exp, x) is None + True + >>> _mostfunc(exp(x) + exp(x*y), exp, x) + exp(x) + """ + fterms = [tmp for tmp in lhs.atoms(func) if (not X or + X.is_Symbol and X in tmp.free_symbols or + not X.is_Symbol and tmp.has(X))] + if len(fterms) == 1: + return fterms[0] + elif fterms: + return max(list(ordered(fterms)), key=lambda x: x.count(func)) + return None + + +def _linab(arg, symbol): + """Return ``a, b, X`` assuming ``arg`` can be written as ``a*X + b`` + where ``X`` is a symbol-dependent factor and ``a`` and ``b`` are + independent of ``symbol``. + + Examples + ======== + + >>> from sympy.solvers.bivariate import _linab + >>> from sympy.abc import x, y + >>> from sympy import exp, S + >>> _linab(S(2), x) + (2, 0, 1) + >>> _linab(2*x, x) + (2, 0, x) + >>> _linab(y + y*x + 2*x, x) + (y + 2, y, x) + >>> _linab(3 + 2*exp(x), x) + (2, 3, exp(x)) + """ + arg = factor_terms(arg.expand()) + ind, dep = arg.as_independent(symbol) + if arg.is_Mul and dep.is_Add: + a, b, x = _linab(dep, symbol) + return ind*a, ind*b, x + if not arg.is_Add: + b = 0 + a, x = ind, dep + else: + b = ind + a, x = separatevars(dep).as_independent(symbol, as_Add=False) + if x.could_extract_minus_sign(): + a = -a + x = -x + return a, b, x + + +def _lambert(eq, x): + """ + Given an expression assumed to be in the form + ``F(X, a..f) = a*log(b*X + c) + d*X + f = 0`` + where X = g(x) and x = g^-1(X), return the Lambert solution, + ``x = g^-1(-c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(-f/a)))``. + """ + eq = _mexpand(expand_log(eq)) + mainlog = _mostfunc(eq, log, x) + if not mainlog: + return [] # violated assumptions + other = eq.subs(mainlog, 0) + if isinstance(-other, log): + eq = (eq - other).subs(mainlog, mainlog.args[0]) + mainlog = mainlog.args[0] + if not isinstance(mainlog, log): + return [] # violated assumptions + other = -(-other).args[0] + eq += other + if x not in other.free_symbols: + return [] # violated assumptions + d, f, X2 = _linab(other, x) + logterm = collect(eq - other, mainlog) + a = logterm.as_coefficient(mainlog) + if a is None or x in a.free_symbols: + return [] # violated assumptions + logarg = mainlog.args[0] + b, c, X1 = _linab(logarg, x) + if X1 != X2: + return [] # violated assumptions + + # invert the generator X1 so we have x(u) + u = Dummy('rhs') + xusolns = solve(X1 - u, x) + + # There are infinitely many branches for LambertW + # but only branches for k = -1 and 0 might be real. The k = 0 + # branch is real and the k = -1 branch is real if the LambertW argument + # in in range [-1/e, 0]. Since `solve` does not return infinite + # solutions we will only include the -1 branch if it tests as real. + # Otherwise, inclusion of any LambertW in the solution indicates to + # the user that there are imaginary solutions corresponding to + # different k values. + lambert_real_branches = [-1, 0] + sol = [] + + # solution of the given Lambert equation is like + # sol = -c/b + (a/d)*LambertW(arg, k), + # where arg = d/(a*b)*exp((c*d-b*f)/a/b) and k in lambert_real_branches. + # Instead of considering the single arg, `d/(a*b)*exp((c*d-b*f)/a/b)`, + # the individual `p` roots obtained when writing `exp((c*d-b*f)/a/b)` + # as `exp(A/p) = exp(A)**(1/p)`, where `p` is an Integer, are used. + + # calculating args for LambertW + num, den = ((c*d-b*f)/a/b).as_numer_denom() + p, den = den.as_coeff_Mul() + e = exp(num/den) + t = Dummy('t') + args = [d/(a*b)*t for t in roots(t**p - e, t).keys()] + + # calculating solutions from args + for arg in args: + for k in lambert_real_branches: + w = LambertW(arg, k) + if k and not w.is_real: + continue + rhs = -c/b + (a/d)*w + + sol.extend(xu.subs(u, rhs) for xu in xusolns) + return sol + + +def _solve_lambert(f, symbol, gens): + """Return solution to ``f`` if it is a Lambert-type expression + else raise NotImplementedError. + + For ``f(X, a..f) = a*log(b*X + c) + d*X - f = 0`` the solution + for ``X`` is ``X = -c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(f/a))``. + There are a variety of forms for `f(X, a..f)` as enumerated below: + + 1a1) + if B**B = R for R not in [0, 1] (since those cases would already + be solved before getting here) then log of both sides gives + log(B) + log(log(B)) = log(log(R)) and + X = log(B), a = 1, b = 1, c = 0, d = 1, f = log(log(R)) + 1a2) + if B*(b*log(B) + c)**a = R then log of both sides gives + log(B) + a*log(b*log(B) + c) = log(R) and + X = log(B), d=1, f=log(R) + 1b) + if a*log(b*B + c) + d*B = R and + X = B, f = R + 2a) + if (b*B + c)*exp(d*B + g) = R then log of both sides gives + log(b*B + c) + d*B + g = log(R) and + X = B, a = 1, f = log(R) - g + 2b) + if g*exp(d*B + h) - b*B = c then the log form is + log(g) + d*B + h - log(b*B + c) = 0 and + X = B, a = -1, f = -h - log(g) + 3) + if d*p**(a*B + g) - b*B = c then the log form is + log(d) + (a*B + g)*log(p) - log(b*B + c) = 0 and + X = B, a = -1, d = a*log(p), f = -log(d) - g*log(p) + """ + + def _solve_even_degree_expr(expr, t, symbol): + """Return the unique solutions of equations derived from + ``expr`` by replacing ``t`` with ``+/- symbol``. + + Parameters + ========== + + expr : Expr + The expression which includes a dummy variable t to be + replaced with +symbol and -symbol. + + symbol : Symbol + The symbol for which a solution is being sought. + + Returns + ======= + + List of unique solution of the two equations generated by + replacing ``t`` with positive and negative ``symbol``. + + Notes + ===== + + If ``expr = 2*log(t) + x/2` then solutions for + ``2*log(x) + x/2 = 0`` and ``2*log(-x) + x/2 = 0`` are + returned by this function. Though this may seem + counter-intuitive, one must note that the ``expr`` being + solved here has been derived from a different expression. For + an expression like ``eq = x**2*g(x) = 1``, if we take the + log of both sides we obtain ``log(x**2) + log(g(x)) = 0``. If + x is positive then this simplifies to + ``2*log(x) + log(g(x)) = 0``; the Lambert-solving routines will + return solutions for this, but we must also consider the + solutions for ``2*log(-x) + log(g(x))`` since those must also + be a solution of ``eq`` which has the same value when the ``x`` + in ``x**2`` is negated. If `g(x)` does not have even powers of + symbol then we do not want to replace the ``x`` there with + ``-x``. So the role of the ``t`` in the expression received by + this function is to mark where ``+/-x`` should be inserted + before obtaining the Lambert solutions. + + """ + nlhs, plhs = [ + expr.xreplace({t: sgn*symbol}) for sgn in (-1, 1)] + sols = _solve_lambert(nlhs, symbol, gens) + if plhs != nlhs: + sols.extend(_solve_lambert(plhs, symbol, gens)) + # uniq is needed for a case like + # 2*log(t) - log(-z**2) + log(z + log(x) + log(z)) + # where substituting t with +/-x gives all the same solution; + # uniq, rather than list(set()), is used to maintain canonical + # order + return list(uniq(sols)) + + nrhs, lhs = f.as_independent(symbol, as_Add=True) + rhs = -nrhs + + lamcheck = [tmp for tmp in gens + if (tmp.func in [exp, log] or + (tmp.is_Pow and symbol in tmp.exp.free_symbols))] + if not lamcheck: + raise NotImplementedError() + + if lhs.is_Add or lhs.is_Mul: + # replacing all even_degrees of symbol with dummy variable t + # since these will need special handling; non-Add/Mul do not + # need this handling + t = Dummy('t', **symbol.assumptions0) + lhs = lhs.replace( + lambda i: # find symbol**even + i.is_Pow and i.base == symbol and i.exp.is_even, + lambda i: # replace t**even + t**i.exp) + + if lhs.is_Add and lhs.has(t): + t_indep = lhs.subs(t, 0) + t_term = lhs - t_indep + _rhs = rhs - t_indep + if not t_term.is_Add and _rhs and not ( + t_term.has(S.ComplexInfinity, S.NaN)): + eq = expand_log(log(t_term) - log(_rhs)) + return _solve_even_degree_expr(eq, t, symbol) + elif lhs.is_Mul and rhs: + # this needs to happen whether t is present or not + lhs = expand_log(log(lhs), force=True) + rhs = log(rhs) + if lhs.has(t) and lhs.is_Add: + # it expanded from Mul to Add + eq = lhs - rhs + return _solve_even_degree_expr(eq, t, symbol) + + # restore symbol in lhs + lhs = lhs.xreplace({t: symbol}) + + lhs = powsimp(factor(lhs, deep=True)) + + # make sure we have inverted as completely as possible + r = Dummy() + i, lhs = _invert(lhs - r, symbol) + rhs = i.xreplace({r: rhs}) + + # For the first forms: + # + # 1a1) B**B = R will arrive here as B*log(B) = log(R) + # lhs is Mul so take log of both sides: + # log(B) + log(log(B)) = log(log(R)) + # 1a2) B*(b*log(B) + c)**a = R will arrive unchanged so + # lhs is Mul, so take log of both sides: + # log(B) + a*log(b*log(B) + c) = log(R) + # 1b) d*log(a*B + b) + c*B = R will arrive unchanged so + # lhs is Add, so isolate c*B and expand log of both sides: + # log(c) + log(B) = log(R - d*log(a*B + b)) + + soln = [] + if not soln: + mainlog = _mostfunc(lhs, log, symbol) + if mainlog: + if lhs.is_Mul and rhs != 0: + soln = _lambert(log(lhs) - log(rhs), symbol) + elif lhs.is_Add: + other = lhs.subs(mainlog, 0) + if other and not other.is_Add and [ + tmp for tmp in other.atoms(Pow) + if symbol in tmp.free_symbols]: + if not rhs: + diff = log(other) - log(other - lhs) + else: + diff = log(lhs - other) - log(rhs - other) + soln = _lambert(expand_log(diff), symbol) + else: + #it's ready to go + soln = _lambert(lhs - rhs, symbol) + + # For the next forms, + # + # collect on main exp + # 2a) (b*B + c)*exp(d*B + g) = R + # lhs is mul, so take log of both sides: + # log(b*B + c) + d*B = log(R) - g + # 2b) g*exp(d*B + h) - b*B = R + # lhs is add, so add b*B to both sides, + # take the log of both sides and rearrange to give + # log(R + b*B) - d*B = log(g) + h + + if not soln: + mainexp = _mostfunc(lhs, exp, symbol) + if mainexp: + lhs = collect(lhs, mainexp) + if lhs.is_Mul and rhs != 0: + soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) + elif lhs.is_Add: + # move all but mainexp-containing term to rhs + other = lhs.subs(mainexp, 0) + mainterm = lhs - other + rhs = rhs - other + if (mainterm.could_extract_minus_sign() and + rhs.could_extract_minus_sign()): + mainterm *= -1 + rhs *= -1 + diff = log(mainterm) - log(rhs) + soln = _lambert(expand_log(diff), symbol) + + # For the last form: + # + # 3) d*p**(a*B + g) - b*B = c + # collect on main pow, add b*B to both sides, + # take log of both sides and rearrange to give + # a*B*log(p) - log(b*B + c) = -log(d) - g*log(p) + if not soln: + mainpow = _mostfunc(lhs, Pow, symbol) + if mainpow and symbol in mainpow.exp.free_symbols: + lhs = collect(lhs, mainpow) + if lhs.is_Mul and rhs != 0: + # b*B = 0 + soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol) + elif lhs.is_Add: + # move all but mainpow-containing term to rhs + other = lhs.subs(mainpow, 0) + mainterm = lhs - other + rhs = rhs - other + diff = log(mainterm) - log(rhs) + soln = _lambert(expand_log(diff), symbol) + + if not soln: + raise NotImplementedError('%s does not appear to have a solution in ' + 'terms of LambertW' % f) + + return list(ordered(soln)) + + +def bivariate_type(f, x, y, *, first=True): + """Given an expression, f, 3 tests will be done to see what type + of composite bivariate it might be, options for u(x, y) are:: + + x*y + x+y + x*y+x + x*y+y + + If it matches one of these types, ``u(x, y)``, ``P(u)`` and dummy + variable ``u`` will be returned. Solving ``P(u)`` for ``u`` and + equating the solutions to ``u(x, y)`` and then solving for ``x`` or + ``y`` is equivalent to solving the original expression for ``x`` or + ``y``. If ``x`` and ``y`` represent two functions in the same + variable, e.g. ``x = g(t)`` and ``y = h(t)``, then if ``u(x, y) - p`` + can be solved for ``t`` then these represent the solutions to + ``P(u) = 0`` when ``p`` are the solutions of ``P(u) = 0``. + + Only positive values of ``u`` are considered. + + Examples + ======== + + >>> from sympy import solve + >>> from sympy.solvers.bivariate import bivariate_type + >>> from sympy.abc import x, y + >>> eq = (x**2 - 3).subs(x, x + y) + >>> bivariate_type(eq, x, y) + (x + y, _u**2 - 3, _u) + >>> uxy, pu, u = _ + >>> usol = solve(pu, u); usol + [sqrt(3)] + >>> [solve(uxy - s) for s in solve(pu, u)] + [[{x: -y + sqrt(3)}]] + >>> all(eq.subs(s).equals(0) for sol in _ for s in sol) + True + + """ + + u = Dummy('u', positive=True) + + if first: + p = Poly(f, x, y) + f = p.as_expr() + _x = Dummy() + _y = Dummy() + rv = bivariate_type(Poly(f.subs({x: _x, y: _y}), _x, _y), _x, _y, first=False) + if rv: + reps = {_x: x, _y: y} + return rv[0].xreplace(reps), rv[1].xreplace(reps), rv[2] + return + + p = f + f = p.as_expr() + + # f(x*y) + args = Add.make_args(p.as_expr()) + new = [] + for a in args: + a = _mexpand(a.subs(x, u/y)) + free = a.free_symbols + if x in free or y in free: + break + new.append(a) + else: + return x*y, Add(*new), u + + def ok(f, v, c): + new = _mexpand(f.subs(v, c)) + free = new.free_symbols + return None if (x in free or y in free) else new + + # f(a*x + b*y) + new = [] + d = p.degree(x) + if p.degree(y) == d: + a = root(p.coeff_monomial(x**d), d) + b = root(p.coeff_monomial(y**d), d) + new = ok(f, x, (u - b*y)/a) + if new is not None: + return a*x + b*y, new, u + + # f(a*x*y + b*y) + new = [] + d = p.degree(x) + if p.degree(y) == d: + for itry in range(2): + a = root(p.coeff_monomial(x**d*y**d), d) + b = root(p.coeff_monomial(y**d), d) + new = ok(f, x, (u - b*y)/a/y) + if new is not None: + return a*x*y + b*y, new, u + x, y = y, x diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/decompogen.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/decompogen.py new file mode 100644 index 0000000000000000000000000000000000000000..ec1b3b683511a34e6f98b9839d112b87517390d8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/decompogen.py @@ -0,0 +1,126 @@ +from sympy.core import (Function, Pow, sympify, Expr) +from sympy.core.relational import Relational +from sympy.core.singleton import S +from sympy.polys import Poly, decompose +from sympy.utilities.misc import func_name +from sympy.functions.elementary.miscellaneous import Min, Max + + +def decompogen(f, symbol): + """ + Computes General functional decomposition of ``f``. + Given an expression ``f``, returns a list ``[f_1, f_2, ..., f_n]``, + where:: + f = f_1 o f_2 o ... f_n = f_1(f_2(... f_n)) + + Note: This is a General decomposition function. It also decomposes + Polynomials. For only Polynomial decomposition see ``decompose`` in polys. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import decompogen, sqrt, sin, cos + >>> decompogen(sin(cos(x)), x) + [sin(x), cos(x)] + >>> decompogen(sin(x)**2 + sin(x) + 1, x) + [x**2 + x + 1, sin(x)] + >>> decompogen(sqrt(6*x**2 - 5), x) + [sqrt(x), 6*x**2 - 5] + >>> decompogen(sin(sqrt(cos(x**2 + 1))), x) + [sin(x), sqrt(x), cos(x), x**2 + 1] + >>> decompogen(x**4 + 2*x**3 - x - 1, x) + [x**2 - x - 1, x**2 + x] + + """ + f = sympify(f) + if not isinstance(f, Expr) or isinstance(f, Relational): + raise TypeError('expecting Expr but got: `%s`' % func_name(f)) + if symbol not in f.free_symbols: + return [f] + + + # ===== Simple Functions ===== # + if isinstance(f, (Function, Pow)): + if f.is_Pow and f.base == S.Exp1: + arg = f.exp + else: + arg = f.args[0] + if arg == symbol: + return [f] + return [f.subs(arg, symbol)] + decompogen(arg, symbol) + + # ===== Min/Max Functions ===== # + if isinstance(f, (Min, Max)): + args = list(f.args) + d0 = None + for i, a in enumerate(args): + if not a.has_free(symbol): + continue + d = decompogen(a, symbol) + if len(d) == 1: + d = [symbol] + d + if d0 is None: + d0 = d[1:] + elif d[1:] != d0: + # decomposition is not the same for each arg: + # mark as having no decomposition + d = [symbol] + break + args[i] = d[0] + if d[0] == symbol: + return [f] + return [f.func(*args)] + d0 + + # ===== Convert to Polynomial ===== # + fp = Poly(f) + gens = list(filter(lambda x: symbol in x.free_symbols, fp.gens)) + + if len(gens) == 1 and gens[0] != symbol: + f1 = f.subs(gens[0], symbol) + f2 = gens[0] + return [f1] + decompogen(f2, symbol) + + # ===== Polynomial decompose() ====== # + try: + return decompose(f) + except ValueError: + return [f] + + +def compogen(g_s, symbol): + """ + Returns the composition of functions. + Given a list of functions ``g_s``, returns their composition ``f``, + where: + f = g_1 o g_2 o .. o g_n + + Note: This is a General composition function. It also composes Polynomials. + For only Polynomial composition see ``compose`` in polys. + + Examples + ======== + + >>> from sympy.solvers.decompogen import compogen + >>> from sympy.abc import x + >>> from sympy import sqrt, sin, cos + >>> compogen([sin(x), cos(x)], x) + sin(cos(x)) + >>> compogen([x**2 + x + 1, sin(x)], x) + sin(x)**2 + sin(x) + 1 + >>> compogen([sqrt(x), 6*x**2 - 5], x) + sqrt(6*x**2 - 5) + >>> compogen([sin(x), sqrt(x), cos(x), x**2 + 1], x) + sin(sqrt(cos(x**2 + 1))) + >>> compogen([x**2 - x - 1, x**2 + x], x) + -x**2 - x + (x**2 + x)**2 - 1 + """ + if len(g_s) == 1: + return g_s[0] + + foo = g_s[0].subs(symbol, g_s[1]) + + if len(g_s) == 2: + return foo + + return compogen([foo] + g_s[2:], symbol) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/deutils.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/deutils.py new file mode 100644 index 0000000000000000000000000000000000000000..b13f37b5004fe7bce2545ad2c788ec3feae56025 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/deutils.py @@ -0,0 +1,273 @@ +"""Utility functions for classifying and solving +ordinary and partial differential equations. + +Contains +======== +_preprocess +ode_order +_desolve + +""" +from sympy.core import Pow +from sympy.core.function import Derivative, AppliedUndef +from sympy.core.relational import Equality +from sympy.core.symbol import Wild + +def _preprocess(expr, func=None, hint='_Integral'): + """Prepare expr for solving by making sure that differentiation + is done so that only func remains in unevaluated derivatives and + (if hint does not end with _Integral) that doit is applied to all + other derivatives. If hint is None, do not do any differentiation. + (Currently this may cause some simple differential equations to + fail.) + + In case func is None, an attempt will be made to autodetect the + function to be solved for. + + >>> from sympy.solvers.deutils import _preprocess + >>> from sympy import Derivative, Function + >>> from sympy.abc import x, y, z + >>> f, g = map(Function, 'fg') + + If f(x)**p == 0 and p>0 then we can solve for f(x)=0 + >>> _preprocess((f(x).diff(x)-4)**5, f(x)) + (Derivative(f(x), x) - 4, f(x)) + + Apply doit to derivatives that contain more than the function + of interest: + + >>> _preprocess(Derivative(f(x) + x, x)) + (Derivative(f(x), x) + 1, f(x)) + + Do others if the differentiation variable(s) intersect with those + of the function of interest or contain the function of interest: + + >>> _preprocess(Derivative(g(x), y, z), f(y)) + (0, f(y)) + >>> _preprocess(Derivative(f(y), z), f(y)) + (0, f(y)) + + Do others if the hint does not end in '_Integral' (the default + assumes that it does): + + >>> _preprocess(Derivative(g(x), y), f(x)) + (Derivative(g(x), y), f(x)) + >>> _preprocess(Derivative(f(x), y), f(x), hint='') + (0, f(x)) + + Do not do any derivatives if hint is None: + + >>> eq = Derivative(f(x) + 1, x) + Derivative(f(x), y) + >>> _preprocess(eq, f(x), hint=None) + (Derivative(f(x) + 1, x) + Derivative(f(x), y), f(x)) + + If it's not clear what the function of interest is, it must be given: + + >>> eq = Derivative(f(x) + g(x), x) + >>> _preprocess(eq, g(x)) + (Derivative(f(x), x) + Derivative(g(x), x), g(x)) + >>> try: _preprocess(eq) + ... except ValueError: print("A ValueError was raised.") + A ValueError was raised. + + """ + if isinstance(expr, Pow): + # if f(x)**p=0 then f(x)=0 (p>0) + if (expr.exp).is_positive: + expr = expr.base + derivs = expr.atoms(Derivative) + if not func: + funcs = set().union(*[d.atoms(AppliedUndef) for d in derivs]) + if len(funcs) != 1: + raise ValueError('The function cannot be ' + 'automatically detected for %s.' % expr) + func = funcs.pop() + fvars = set(func.args) + if hint is None: + return expr, func + reps = [(d, d.doit()) for d in derivs if not hint.endswith('_Integral') or + d.has(func) or set(d.variables) & fvars] + eq = expr.subs(reps) + return eq, func + + +def ode_order(expr, func): + """ + Returns the order of a given differential + equation with respect to func. + + This function is implemented recursively. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.solvers.deutils import ode_order + >>> from sympy.abc import x + >>> f, g = map(Function, ['f', 'g']) + >>> ode_order(f(x).diff(x, 2) + f(x).diff(x)**2 + + ... f(x).diff(x), f(x)) + 2 + >>> ode_order(f(x).diff(x, 2) + g(x).diff(x, 3), f(x)) + 2 + >>> ode_order(f(x).diff(x, 2) + g(x).diff(x, 3), g(x)) + 3 + + """ + a = Wild('a', exclude=[func]) + if expr.match(a): + return 0 + + if isinstance(expr, Derivative): + if expr.args[0] == func: + return len(expr.variables) + else: + args = expr.args[0].args + rv = len(expr.variables) + if args: + rv += max(ode_order(_, func) for _ in args) + return rv + else: + return max(ode_order(_, func) for _ in expr.args) if expr.args else 0 + + +def _desolve(eq, func=None, hint="default", ics=None, simplify=True, *, prep=True, **kwargs): + """This is a helper function to dsolve and pdsolve in the ode + and pde modules. + + If the hint provided to the function is "default", then a dict with + the following keys are returned + + 'func' - It provides the function for which the differential equation + has to be solved. This is useful when the expression has + more than one function in it. + + 'default' - The default key as returned by classifier functions in ode + and pde.py + + 'hint' - The hint given by the user for which the differential equation + is to be solved. If the hint given by the user is 'default', + then the value of 'hint' and 'default' is the same. + + 'order' - The order of the function as returned by ode_order + + 'match' - It returns the match as given by the classifier functions, for + the default hint. + + If the hint provided to the function is not "default" and is not in + ('all', 'all_Integral', 'best'), then a dict with the above mentioned keys + is returned along with the keys which are returned when dict in + classify_ode or classify_pde is set True + + If the hint given is in ('all', 'all_Integral', 'best'), then this function + returns a nested dict, with the keys, being the set of classified hints + returned by classifier functions, and the values being the dict of form + as mentioned above. + + Key 'eq' is a common key to all the above mentioned hints which returns an + expression if eq given by user is an Equality. + + See Also + ======== + classify_ode(ode.py) + classify_pde(pde.py) + """ + if isinstance(eq, Equality): + eq = eq.lhs - eq.rhs + + # preprocess the equation and find func if not given + if prep or func is None: + eq, func = _preprocess(eq, func) + prep = False + + # type is an argument passed by the solve functions in ode and pde.py + # that identifies whether the function caller is an ordinary + # or partial differential equation. Accordingly corresponding + # changes are made in the function. + type = kwargs.get('type', None) + xi = kwargs.get('xi') + eta = kwargs.get('eta') + x0 = kwargs.get('x0', 0) + terms = kwargs.get('n') + + if type == 'ode': + from sympy.solvers.ode import classify_ode, allhints + classifier = classify_ode + string = 'ODE ' + dummy = '' + + elif type == 'pde': + from sympy.solvers.pde import classify_pde, allhints + classifier = classify_pde + string = 'PDE ' + dummy = 'p' + + # Magic that should only be used internally. Prevents classify_ode from + # being called more than it needs to be by passing its results through + # recursive calls. + if kwargs.get('classify', True): + hints = classifier(eq, func, dict=True, ics=ics, xi=xi, eta=eta, + n=terms, x0=x0, hint=hint, prep=prep) + + else: + # Here is what all this means: + # + # hint: The hint method given to _desolve() by the user. + # hints: The dictionary of hints that match the DE, along with other + # information (including the internal pass-through magic). + # default: The default hint to return, the first hint from allhints + # that matches the hint; obtained from classify_ode(). + # match: Dictionary containing the match dictionary for each hint + # (the parts of the DE for solving). When going through the + # hints in "all", this holds the match string for the current + # hint. + # order: The order of the DE, as determined by ode_order(). + hints = kwargs.get('hint', + {'default': hint, + hint: kwargs['match'], + 'order': kwargs['order']}) + if not hints['default']: + # classify_ode will set hints['default'] to None if no hints match. + if hint not in allhints and hint != 'default': + raise ValueError("Hint not recognized: " + hint) + elif hint not in hints['ordered_hints'] and hint != 'default': + raise ValueError(string + str(eq) + " does not match hint " + hint) + # If dsolve can't solve the purely algebraic equation then dsolve will raise + # ValueError + elif hints['order'] == 0: + raise ValueError( + str(eq) + " is not a solvable differential equation in " + str(func)) + else: + raise NotImplementedError(dummy + "solve" + ": Cannot solve " + str(eq)) + if hint == 'default': + return _desolve(eq, func, ics=ics, hint=hints['default'], simplify=simplify, + prep=prep, x0=x0, classify=False, order=hints['order'], + match=hints[hints['default']], xi=xi, eta=eta, n=terms, type=type) + elif hint in ('all', 'all_Integral', 'best'): + retdict = {} + gethints = set(hints) - {'order', 'default', 'ordered_hints'} + if hint == 'all_Integral': + for i in hints: + if i.endswith('_Integral'): + gethints.remove(i.removesuffix('_Integral')) + # special cases + for k in ["1st_homogeneous_coeff_best", "1st_power_series", + "lie_group", "2nd_power_series_ordinary", "2nd_power_series_regular"]: + if k in gethints: + gethints.remove(k) + for i in gethints: + sol = _desolve(eq, func, ics=ics, hint=i, x0=x0, simplify=simplify, prep=prep, + classify=False, n=terms, order=hints['order'], match=hints[i], type=type) + retdict[i] = sol + retdict['all'] = True + retdict['eq'] = eq + return retdict + elif hint not in allhints: # and hint not in ('default', 'ordered_hints'): + raise ValueError("Hint not recognized: " + hint) + elif hint not in hints: + raise ValueError(string + str(eq) + " does not match hint " + hint) + else: + # Key added to identify the hint needed to solve the equation + hints['hint'] = hint + hints.update({'func': func, 'eq': eq}) + return hints diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..23c21242208d6f520c130250ecdce43382b9d868 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__init__.py @@ -0,0 +1,5 @@ +from .diophantine import diophantine, classify_diop, diop_solve + +__all__ = [ + 'diophantine', 'classify_diop', 'diop_solve' +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..c46b26999d00447a7066eea160f5c6899ce58d58 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/diophantine.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/diophantine.py new file mode 100644 index 0000000000000000000000000000000000000000..ffdef6344451c96ed48dff099cf8f02494f4b504 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/diophantine.py @@ -0,0 +1,3980 @@ +from __future__ import annotations + +from sympy.core.add import Add +from sympy.core.assumptions import check_assumptions +from sympy.core.containers import Tuple +from sympy.core.exprtools import factor_terms +from sympy.core.function import _mexpand +from sympy.core.mul import Mul +from sympy.core.numbers import Rational, int_valued +from sympy.core.intfunc import igcdex, ilcm, igcd, integer_nthroot, isqrt +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key, ordered +from sympy.core.symbol import Symbol, symbols +from sympy.core.sympify import _sympify +from sympy.external.gmpy import jacobi, remove, invert, iroot +from sympy.functions.elementary.complexes import sign +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.matrices.dense import MutableDenseMatrix as Matrix +from sympy.ntheory.factor_ import divisors, factorint, perfect_power +from sympy.ntheory.generate import nextprime +from sympy.ntheory.primetest import is_square, isprime +from sympy.ntheory.modular import symmetric_residue +from sympy.ntheory.residue_ntheory import sqrt_mod, sqrt_mod_iter +from sympy.polys.polyerrors import GeneratorsNeeded +from sympy.polys.polytools import Poly, factor_list +from sympy.simplify.simplify import signsimp +from sympy.solvers.solveset import solveset_real +from sympy.utilities import numbered_symbols +from sympy.utilities.misc import as_int, filldedent +from sympy.utilities.iterables import (is_sequence, subsets, permute_signs, + signed_permutations, ordered_partitions) + + +# these are imported with 'from sympy.solvers.diophantine import * +__all__ = ['diophantine', 'classify_diop'] + + +class DiophantineSolutionSet(set): + """ + Container for a set of solutions to a particular diophantine equation. + + The base representation is a set of tuples representing each of the solutions. + + Parameters + ========== + + symbols : list + List of free symbols in the original equation. + parameters: list + List of parameters to be used in the solution. + + Examples + ======== + + Adding solutions: + + >>> from sympy.solvers.diophantine.diophantine import DiophantineSolutionSet + >>> from sympy.abc import x, y, t, u + >>> s1 = DiophantineSolutionSet([x, y], [t, u]) + >>> s1 + set() + >>> s1.add((2, 3)) + >>> s1.add((-1, u)) + >>> s1 + {(-1, u), (2, 3)} + >>> s2 = DiophantineSolutionSet([x, y], [t, u]) + >>> s2.add((3, 4)) + >>> s1.update(*s2) + >>> s1 + {(-1, u), (2, 3), (3, 4)} + + Conversion of solutions into dicts: + + >>> list(s1.dict_iterator()) + [{x: -1, y: u}, {x: 2, y: 3}, {x: 3, y: 4}] + + Substituting values: + + >>> s3 = DiophantineSolutionSet([x, y], [t, u]) + >>> s3.add((t**2, t + u)) + >>> s3 + {(t**2, t + u)} + >>> s3.subs({t: 2, u: 3}) + {(4, 5)} + >>> s3.subs(t, -1) + {(1, u - 1)} + >>> s3.subs(t, 3) + {(9, u + 3)} + + Evaluation at specific values. Positional arguments are given in the same order as the parameters: + + >>> s3(-2, 3) + {(4, 1)} + >>> s3(5) + {(25, u + 5)} + >>> s3(None, 2) + {(t**2, t + 2)} + """ + + def __init__(self, symbols_seq, parameters): + super().__init__() + + if not is_sequence(symbols_seq): + raise ValueError("Symbols must be given as a sequence.") + + if not is_sequence(parameters): + raise ValueError("Parameters must be given as a sequence.") + + self.symbols = tuple(symbols_seq) + self.parameters = tuple(parameters) + + def add(self, solution): + if len(solution) != len(self.symbols): + raise ValueError("Solution should have a length of %s, not %s" % (len(self.symbols), len(solution))) + # make solution canonical wrt sign (i.e. no -x unless x is also present as an arg) + args = set(solution) + for i in range(len(solution)): + x = solution[i] + if not type(x) is int and (-x).is_Symbol and -x not in args: + solution = [_.subs(-x, x) for _ in solution] + super().add(Tuple(*solution)) + + def update(self, *solutions): + for solution in solutions: + self.add(solution) + + def dict_iterator(self): + for solution in ordered(self): + yield dict(zip(self.symbols, solution)) + + def subs(self, *args, **kwargs): + result = DiophantineSolutionSet(self.symbols, self.parameters) + for solution in self: + result.add(solution.subs(*args, **kwargs)) + return result + + def __call__(self, *args): + if len(args) > len(self.parameters): + raise ValueError("Evaluation should have at most %s values, not %s" % (len(self.parameters), len(args))) + rep = {p: v for p, v in zip(self.parameters, args) if v is not None} + return self.subs(rep) + + +class DiophantineEquationType: + """ + Internal representation of a particular diophantine equation type. + + Parameters + ========== + + equation : + The diophantine equation that is being solved. + free_symbols : list (optional) + The symbols being solved for. + + Attributes + ========== + + total_degree : + The maximum of the degrees of all terms in the equation + homogeneous : + Does the equation contain a term of degree 0 + homogeneous_order : + Does the equation contain any coefficient that is in the symbols being solved for + dimension : + The number of symbols being solved for + """ + name: str + + def __init__(self, equation, free_symbols=None): + self.equation = _sympify(equation).expand(force=True) + + if free_symbols is not None: + self.free_symbols = free_symbols + else: + self.free_symbols = list(self.equation.free_symbols) + self.free_symbols.sort(key=default_sort_key) + + if not self.free_symbols: + raise ValueError('equation should have 1 or more free symbols') + + self.coeff = self.equation.as_coefficients_dict() + if not all(int_valued(c) for c in self.coeff.values()): + raise TypeError("Coefficients should be Integers") + + self.total_degree = Poly(self.equation).total_degree() + self.homogeneous = 1 not in self.coeff + self.homogeneous_order = not (set(self.coeff) & set(self.free_symbols)) + self.dimension = len(self.free_symbols) + self._parameters = None + + def matches(self): + """ + Determine whether the given equation can be matched to the particular equation type. + """ + return False + + @property + def n_parameters(self): + return self.dimension + + @property + def parameters(self): + if self._parameters is None: + self._parameters = symbols('t_:%i' % (self.n_parameters,), integer=True) + return self._parameters + + def solve(self, parameters=None, limit=None) -> DiophantineSolutionSet: + raise NotImplementedError('No solver has been written for %s.' % self.name) + + def pre_solve(self, parameters=None): + if not self.matches(): + raise ValueError("This equation does not match the %s equation type." % self.name) + + if parameters is not None: + if len(parameters) != self.n_parameters: + raise ValueError("Expected %s parameter(s) but got %s" % (self.n_parameters, len(parameters))) + + self._parameters = parameters + + +class Univariate(DiophantineEquationType): + """ + Representation of a univariate diophantine equation. + + A univariate diophantine equation is an equation of the form + `a_{0} + a_{1}x + a_{2}x^2 + .. + a_{n}x^n = 0` where `a_{1}, a_{2}, ..a_{n}` are + integer constants and `x` is an integer variable. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import Univariate + >>> from sympy.abc import x + >>> Univariate((x - 2)*(x - 3)**2).solve() # solves equation (x - 2)*(x - 3)**2 == 0 + {(2,), (3,)} + + """ + + name = 'univariate' + + def matches(self): + return self.dimension == 1 + + def solve(self, parameters=None, limit=None): + self.pre_solve(parameters) + + result = DiophantineSolutionSet(self.free_symbols, parameters=self.parameters) + for i in solveset_real(self.equation, self.free_symbols[0]).intersect(S.Integers): + result.add((i,)) + return result + + +class Linear(DiophantineEquationType): + """ + Representation of a linear diophantine equation. + + A linear diophantine equation is an equation of the form `a_{1}x_{1} + + a_{2}x_{2} + .. + a_{n}x_{n} = 0` where `a_{1}, a_{2}, ..a_{n}` are + integer constants and `x_{1}, x_{2}, ..x_{n}` are integer variables. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import Linear + >>> from sympy.abc import x, y, z + >>> l1 = Linear(2*x - 3*y - 5) + >>> l1.matches() # is this equation linear + True + >>> l1.solve() # solves equation 2*x - 3*y - 5 == 0 + {(3*t_0 - 5, 2*t_0 - 5)} + + Here x = -3*t_0 - 5 and y = -2*t_0 - 5 + + >>> Linear(2*x - 3*y - 4*z -3).solve() + {(t_0, 2*t_0 + 4*t_1 + 3, -t_0 - 3*t_1 - 3)} + + """ + + name = 'linear' + + def matches(self): + return self.total_degree == 1 + + def solve(self, parameters=None, limit=None): + self.pre_solve(parameters) + + coeff = self.coeff + var = self.free_symbols + + if 1 in coeff: + # negate coeff[] because input is of the form: ax + by + c == 0 + # but is used as: ax + by == -c + c = -coeff[1] + else: + c = 0 + + result = DiophantineSolutionSet(var, parameters=self.parameters) + params = result.parameters + + if len(var) == 1: + q, r = divmod(c, coeff[var[0]]) + if not r: + result.add((q,)) + return result + + ''' + base_solution_linear() can solve diophantine equations of the form: + + a*x + b*y == c + + We break down multivariate linear diophantine equations into a + series of bivariate linear diophantine equations which can then + be solved individually by base_solution_linear(). + + Consider the following: + + a_0*x_0 + a_1*x_1 + a_2*x_2 == c + + which can be re-written as: + + a_0*x_0 + g_0*y_0 == c + + where + + g_0 == gcd(a_1, a_2) + + and + + y == (a_1*x_1)/g_0 + (a_2*x_2)/g_0 + + This leaves us with two binary linear diophantine equations. + For the first equation: + + a == a_0 + b == g_0 + c == c + + For the second: + + a == a_1/g_0 + b == a_2/g_0 + c == the solution we find for y_0 in the first equation. + + The arrays A and B are the arrays of integers used for + 'a' and 'b' in each of the n-1 bivariate equations we solve. + ''' + + A = [coeff[v] for v in var] + B = [] + if len(var) > 2: + B.append(igcd(A[-2], A[-1])) + A[-2] = A[-2] // B[0] + A[-1] = A[-1] // B[0] + for i in range(len(A) - 3, 0, -1): + gcd = igcd(B[0], A[i]) + B[0] = B[0] // gcd + A[i] = A[i] // gcd + B.insert(0, gcd) + B.append(A[-1]) + + ''' + Consider the trivariate linear equation: + + 4*x_0 + 6*x_1 + 3*x_2 == 2 + + This can be re-written as: + + 4*x_0 + 3*y_0 == 2 + + where + + y_0 == 2*x_1 + x_2 + (Note that gcd(3, 6) == 3) + + The complete integral solution to this equation is: + + x_0 == 2 + 3*t_0 + y_0 == -2 - 4*t_0 + + where 't_0' is any integer. + + Now that we have a solution for 'x_0', find 'x_1' and 'x_2': + + 2*x_1 + x_2 == -2 - 4*t_0 + + We can then solve for '-2' and '-4' independently, + and combine the results: + + 2*x_1a + x_2a == -2 + x_1a == 0 + t_0 + x_2a == -2 - 2*t_0 + + 2*x_1b + x_2b == -4*t_0 + x_1b == 0*t_0 + t_1 + x_2b == -4*t_0 - 2*t_1 + + ==> + + x_1 == t_0 + t_1 + x_2 == -2 - 6*t_0 - 2*t_1 + + where 't_0' and 't_1' are any integers. + + Note that: + + 4*(2 + 3*t_0) + 6*(t_0 + t_1) + 3*(-2 - 6*t_0 - 2*t_1) == 2 + + for any integral values of 't_0', 't_1'; as required. + + This method is generalised for many variables, below. + + ''' + solutions = [] + for Ai, Bi in zip(A, B): + tot_x, tot_y = [], [] + + for arg in Add.make_args(c): + if arg.is_Integer: + # example: 5 -> k = 5 + k, p = arg, S.One + pnew = params[0] + else: # arg is a Mul or Symbol + # example: 3*t_1 -> k = 3 + # example: t_0 -> k = 1 + k, p = arg.as_coeff_Mul() + pnew = params[params.index(p) + 1] + + sol = sol_x, sol_y = base_solution_linear(k, Ai, Bi, pnew) + + if p is S.One: + if None in sol: + return result + else: + # convert a + b*pnew -> a*p + b*pnew + if isinstance(sol_x, Add): + sol_x = sol_x.args[0]*p + sol_x.args[1] + if isinstance(sol_y, Add): + sol_y = sol_y.args[0]*p + sol_y.args[1] + + tot_x.append(sol_x) + tot_y.append(sol_y) + + solutions.append(Add(*tot_x)) + c = Add(*tot_y) + + solutions.append(c) + result.add(solutions) + return result + + +class BinaryQuadratic(DiophantineEquationType): + """ + Representation of a binary quadratic diophantine equation. + + A binary quadratic diophantine equation is an equation of the + form `Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0`, where `A, B, C, D, E, + F` are integer constants and `x` and `y` are integer variables. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.solvers.diophantine.diophantine import BinaryQuadratic + >>> b1 = BinaryQuadratic(x**3 + y**2 + 1) + >>> b1.matches() + False + >>> b2 = BinaryQuadratic(x**2 + y**2 + 2*x + 2*y + 2) + >>> b2.matches() + True + >>> b2.solve() + {(-1, -1)} + + References + ========== + + .. [1] Methods to solve Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0, [online], + Available: https://www.alpertron.com.ar/METHODS.HTM + .. [2] Solving the equation ax^2+ bxy + cy^2 + dx + ey + f= 0, [online], + Available: https://web.archive.org/web/20160323033111/http://www.jpr2718.org/ax2p.pdf + + """ + + name = 'binary_quadratic' + + def matches(self): + return self.total_degree == 2 and self.dimension == 2 + + def solve(self, parameters=None, limit=None) -> DiophantineSolutionSet: + self.pre_solve(parameters) + + var = self.free_symbols + coeff = self.coeff + + x, y = var + + A = coeff[x**2] + B = coeff[x*y] + C = coeff[y**2] + D = coeff[x] + E = coeff[y] + F = coeff[S.One] + + A, B, C, D, E, F = [as_int(i) for i in _remove_gcd(A, B, C, D, E, F)] + + # (1) Simple-Hyperbolic case: A = C = 0, B != 0 + # In this case equation can be converted to (Bx + E)(By + D) = DE - BF + # We consider two cases; DE - BF = 0 and DE - BF != 0 + # More details, https://www.alpertron.com.ar/METHODS.HTM#SHyperb + + result = DiophantineSolutionSet(var, self.parameters) + t, u = result.parameters + + discr = B**2 - 4*A*C + if A == 0 and C == 0 and B != 0: + + if D*E - B*F == 0: + q, r = divmod(E, B) + if not r: + result.add((-q, t)) + q, r = divmod(D, B) + if not r: + result.add((t, -q)) + else: + div = divisors(D*E - B*F) + div = div + [-term for term in div] + for d in div: + x0, r = divmod(d - E, B) + if not r: + q, r = divmod(D*E - B*F, d) + if not r: + y0, r = divmod(q - D, B) + if not r: + result.add((x0, y0)) + + # (2) Parabolic case: B**2 - 4*A*C = 0 + # There are two subcases to be considered in this case. + # sqrt(c)D - sqrt(a)E = 0 and sqrt(c)D - sqrt(a)E != 0 + # More Details, https://www.alpertron.com.ar/METHODS.HTM#Parabol + + elif discr == 0: + + if A == 0: + s = BinaryQuadratic(self.equation, free_symbols=[y, x]).solve(parameters=[t, u]) + for soln in s: + result.add((soln[1], soln[0])) + + else: + g = sign(A)*igcd(A, C) + a = A // g + c = C // g + e = sign(B / A) + + sqa = isqrt(a) + sqc = isqrt(c) + _c = e*sqc*D - sqa*E + if not _c: + z = Symbol("z", real=True) + eq = sqa*g*z**2 + D*z + sqa*F + roots = solveset_real(eq, z).intersect(S.Integers) + for root in roots: + ans = diop_solve(sqa*x + e*sqc*y - root) + result.add((ans[0], ans[1])) + + elif int_valued(c): + solve_x = lambda u: -e*sqc*g*_c*t**2 - (E + 2*e*sqc*g*u)*t \ + - (e*sqc*g*u**2 + E*u + e*sqc*F) // _c + + solve_y = lambda u: sqa*g*_c*t**2 + (D + 2*sqa*g*u)*t \ + + (sqa*g*u**2 + D*u + sqa*F) // _c + + for z0 in range(0, abs(_c)): + # Check if the coefficients of y and x obtained are integers or not + if (divisible(sqa*g*z0**2 + D*z0 + sqa*F, _c) and + divisible(e*sqc*g*z0**2 + E*z0 + e*sqc*F, _c)): + result.add((solve_x(z0), solve_y(z0))) + + # (3) Method used when B**2 - 4*A*C is a square, is described in p. 6 of the below paper + # by John P. Robertson. + # https://web.archive.org/web/20160323033111/http://www.jpr2718.org/ax2p.pdf + + elif is_square(discr): + if A != 0: + r = sqrt(discr) + u, v = symbols("u, v", integer=True) + eq = _mexpand( + 4*A*r*u*v + 4*A*D*(B*v + r*u + r*v - B*u) + + 2*A*4*A*E*(u - v) + 4*A*r*4*A*F) + + solution = diop_solve(eq, t) + + for s0, t0 in solution: + + num = B*t0 + r*s0 + r*t0 - B*s0 + x_0 = S(num) / (4*A*r) + y_0 = S(s0 - t0) / (2*r) + if isinstance(s0, Symbol) or isinstance(t0, Symbol): + if len(check_param(x_0, y_0, 4*A*r, parameters)) > 0: + ans = check_param(x_0, y_0, 4*A*r, parameters) + result.update(*ans) + elif x_0.is_Integer and y_0.is_Integer: + if is_solution_quad(var, coeff, x_0, y_0): + result.add((x_0, y_0)) + + else: + s = BinaryQuadratic(self.equation, free_symbols=var[::-1]).solve(parameters=[t, u]) # Interchange x and y + while s: + result.add(s.pop()[::-1]) # and solution <--------+ + + # (4) B**2 - 4*A*C > 0 and B**2 - 4*A*C not a square or B**2 - 4*A*C < 0 + + else: + + P, Q = _transformation_to_DN(var, coeff) + D, N = _find_DN(var, coeff) + solns_pell = diop_DN(D, N) + + if D < 0: + for x0, y0 in solns_pell: + for x in [-x0, x0]: + for y in [-y0, y0]: + s = P*Matrix([x, y]) + Q + try: + result.add([as_int(_) for _ in s]) + except ValueError: + pass + else: + # In this case equation can be transformed into a Pell equation + + solns_pell = set(solns_pell) + solns_pell.update((-X, -Y) for X, Y in list(solns_pell)) + + a = diop_DN(D, 1) + T = a[0][0] + U = a[0][1] + + if all(int_valued(_) for _ in P[:4] + Q[:2]): + for r, s in solns_pell: + _a = (r + s*sqrt(D))*(T + U*sqrt(D))**t + _b = (r - s*sqrt(D))*(T - U*sqrt(D))**t + x_n = _mexpand(S(_a + _b) / 2) + y_n = _mexpand(S(_a - _b) / (2*sqrt(D))) + s = P*Matrix([x_n, y_n]) + Q + result.add(s) + + else: + L = ilcm(*[_.q for _ in P[:4] + Q[:2]]) + + k = 1 + + T_k = T + U_k = U + + while (T_k - 1) % L != 0 or U_k % L != 0: + T_k, U_k = T_k*T + D*U_k*U, T_k*U + U_k*T + k += 1 + + for X, Y in solns_pell: + + for i in range(k): + if all(int_valued(_) for _ in P*Matrix([X, Y]) + Q): + _a = (X + sqrt(D)*Y)*(T_k + sqrt(D)*U_k)**t + _b = (X - sqrt(D)*Y)*(T_k - sqrt(D)*U_k)**t + Xt = S(_a + _b) / 2 + Yt = S(_a - _b) / (2*sqrt(D)) + s = P*Matrix([Xt, Yt]) + Q + result.add(s) + + X, Y = X*T + D*U*Y, X*U + Y*T + + return result + + +class InhomogeneousTernaryQuadratic(DiophantineEquationType): + """ + + Representation of an inhomogeneous ternary quadratic. + + No solver is currently implemented for this equation type. + + """ + + name = 'inhomogeneous_ternary_quadratic' + + def matches(self): + if not (self.total_degree == 2 and self.dimension == 3): + return False + if not self.homogeneous: + return False + return not self.homogeneous_order + + +class HomogeneousTernaryQuadraticNormal(DiophantineEquationType): + """ + Representation of a homogeneous ternary quadratic normal diophantine equation. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.solvers.diophantine.diophantine import HomogeneousTernaryQuadraticNormal + >>> HomogeneousTernaryQuadraticNormal(4*x**2 - 5*y**2 + z**2).solve() + {(1, 2, 4)} + + """ + + name = 'homogeneous_ternary_quadratic_normal' + + def matches(self): + if not (self.total_degree == 2 and self.dimension == 3): + return False + if not self.homogeneous: + return False + if not self.homogeneous_order: + return False + + nonzero = [k for k in self.coeff if self.coeff[k]] + return len(nonzero) == 3 and all(i**2 in nonzero for i in self.free_symbols) + + def solve(self, parameters=None, limit=None) -> DiophantineSolutionSet: + self.pre_solve(parameters) + + var = self.free_symbols + coeff = self.coeff + + x, y, z = var + + a = coeff[x**2] + b = coeff[y**2] + c = coeff[z**2] + + (sqf_of_a, sqf_of_b, sqf_of_c), (a_1, b_1, c_1), (a_2, b_2, c_2) = \ + sqf_normal(a, b, c, steps=True) + + A = -a_2*c_2 + B = -b_2*c_2 + + result = DiophantineSolutionSet(var, parameters=self.parameters) + + # If following two conditions are satisfied then there are no solutions + if A < 0 and B < 0: + return result + + if ( + sqrt_mod(-b_2*c_2, a_2) is None or + sqrt_mod(-c_2*a_2, b_2) is None or + sqrt_mod(-a_2*b_2, c_2) is None): + return result + + z_0, x_0, y_0 = descent(A, B) + + z_0, q = _rational_pq(z_0, abs(c_2)) + x_0 *= q + y_0 *= q + + x_0, y_0, z_0 = _remove_gcd(x_0, y_0, z_0) + + # Holzer reduction + if sign(a) == sign(b): + x_0, y_0, z_0 = holzer(x_0, y_0, z_0, abs(a_2), abs(b_2), abs(c_2)) + elif sign(a) == sign(c): + x_0, z_0, y_0 = holzer(x_0, z_0, y_0, abs(a_2), abs(c_2), abs(b_2)) + else: + y_0, z_0, x_0 = holzer(y_0, z_0, x_0, abs(b_2), abs(c_2), abs(a_2)) + + x_0 = reconstruct(b_1, c_1, x_0) + y_0 = reconstruct(a_1, c_1, y_0) + z_0 = reconstruct(a_1, b_1, z_0) + + sq_lcm = ilcm(sqf_of_a, sqf_of_b, sqf_of_c) + + x_0 = abs(x_0*sq_lcm // sqf_of_a) + y_0 = abs(y_0*sq_lcm // sqf_of_b) + z_0 = abs(z_0*sq_lcm // sqf_of_c) + + result.add(_remove_gcd(x_0, y_0, z_0)) + return result + + +class HomogeneousTernaryQuadratic(DiophantineEquationType): + """ + Representation of a homogeneous ternary quadratic diophantine equation. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.solvers.diophantine.diophantine import HomogeneousTernaryQuadratic + >>> HomogeneousTernaryQuadratic(x**2 + y**2 - 3*z**2 + x*y).solve() + {(-1, 2, 1)} + >>> HomogeneousTernaryQuadratic(3*x**2 + y**2 - 3*z**2 + 5*x*y + y*z).solve() + {(3, 12, 13)} + + """ + + name = 'homogeneous_ternary_quadratic' + + def matches(self): + if not (self.total_degree == 2 and self.dimension == 3): + return False + if not self.homogeneous: + return False + if not self.homogeneous_order: + return False + + nonzero = [k for k in self.coeff if self.coeff[k]] + return not (len(nonzero) == 3 and all(i**2 in nonzero for i in self.free_symbols)) + + def solve(self, parameters=None, limit=None): + self.pre_solve(parameters) + + _var = self.free_symbols + coeff = self.coeff + + x, y, z = _var + var = [x, y, z] + + # Equations of the form B*x*y + C*z*x + E*y*z = 0 and At least two of the + # coefficients A, B, C are non-zero. + # There are infinitely many solutions for the equation. + # Ex: (0, 0, t), (0, t, 0), (t, 0, 0) + # Equation can be re-written as y*(B*x + E*z) = -C*x*z and we can find rather + # unobvious solutions. Set y = -C and B*x + E*z = x*z. The latter can be solved by + # using methods for binary quadratic diophantine equations. Let's select the + # solution which minimizes |x| + |z| + + result = DiophantineSolutionSet(var, parameters=self.parameters) + + def unpack_sol(sol): + if len(sol) > 0: + return list(sol)[0] + return None, None, None + + if not any(coeff[i**2] for i in var): + if coeff[x*z]: + sols = diophantine(coeff[x*y]*x + coeff[y*z]*z - x*z) + s = min(sols, key=lambda r: abs(r[0]) + abs(r[1])) + result.add(_remove_gcd(s[0], -coeff[x*z], s[1])) + return result + + var[0], var[1] = _var[1], _var[0] + y_0, x_0, z_0 = unpack_sol(_diop_ternary_quadratic(var, coeff)) + if x_0 is not None: + result.add((x_0, y_0, z_0)) + return result + + if coeff[x**2] == 0: + # If the coefficient of x is zero change the variables + if coeff[y**2] == 0: + var[0], var[2] = _var[2], _var[0] + z_0, y_0, x_0 = unpack_sol(_diop_ternary_quadratic(var, coeff)) + + else: + var[0], var[1] = _var[1], _var[0] + y_0, x_0, z_0 = unpack_sol(_diop_ternary_quadratic(var, coeff)) + + else: + if coeff[x*y] or coeff[x*z]: + # Apply the transformation x --> X - (B*y + C*z)/(2*A) + A = coeff[x**2] + B = coeff[x*y] + C = coeff[x*z] + D = coeff[y**2] + E = coeff[y*z] + F = coeff[z**2] + + _coeff = {} + + _coeff[x**2] = 4*A**2 + _coeff[y**2] = 4*A*D - B**2 + _coeff[z**2] = 4*A*F - C**2 + _coeff[y*z] = 4*A*E - 2*B*C + _coeff[x*y] = 0 + _coeff[x*z] = 0 + + x_0, y_0, z_0 = unpack_sol(_diop_ternary_quadratic(var, _coeff)) + + if x_0 is None: + return result + + p, q = _rational_pq(B*y_0 + C*z_0, 2*A) + x_0, y_0, z_0 = x_0*q - p, y_0*q, z_0*q + + elif coeff[z*y] != 0: + if coeff[y**2] == 0: + if coeff[z**2] == 0: + # Equations of the form A*x**2 + E*yz = 0. + A = coeff[x**2] + E = coeff[y*z] + + b, a = _rational_pq(-E, A) + + x_0, y_0, z_0 = b, a, b + + else: + # Ax**2 + E*y*z + F*z**2 = 0 + var[0], var[2] = _var[2], _var[0] + z_0, y_0, x_0 = unpack_sol(_diop_ternary_quadratic(var, coeff)) + + else: + # A*x**2 + D*y**2 + E*y*z + F*z**2 = 0, C may be zero + var[0], var[1] = _var[1], _var[0] + y_0, x_0, z_0 = unpack_sol(_diop_ternary_quadratic(var, coeff)) + + else: + # Ax**2 + D*y**2 + F*z**2 = 0, C may be zero + x_0, y_0, z_0 = unpack_sol(_diop_ternary_quadratic_normal(var, coeff)) + + if x_0 is None: + return result + + result.add(_remove_gcd(x_0, y_0, z_0)) + return result + + +class InhomogeneousGeneralQuadratic(DiophantineEquationType): + """ + + Representation of an inhomogeneous general quadratic. + + No solver is currently implemented for this equation type. + + """ + + name = 'inhomogeneous_general_quadratic' + + def matches(self): + if not (self.total_degree == 2 and self.dimension >= 3): + return False + if not self.homogeneous_order: + return True + # there may be Pow keys like x**2 or Mul keys like x*y + return any(k.is_Mul for k in self.coeff) and not self.homogeneous + + +class HomogeneousGeneralQuadratic(DiophantineEquationType): + """ + + Representation of a homogeneous general quadratic. + + No solver is currently implemented for this equation type. + + """ + + name = 'homogeneous_general_quadratic' + + def matches(self): + if not (self.total_degree == 2 and self.dimension >= 3): + return False + if not self.homogeneous_order: + return False + # there may be Pow keys like x**2 or Mul keys like x*y + return any(k.is_Mul for k in self.coeff) and self.homogeneous + + +class GeneralSumOfSquares(DiophantineEquationType): + r""" + Representation of the diophantine equation + + `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. + + Details + ======= + + When `n = 3` if `k = 4^a(8m + 7)` for some `a, m \in Z` then there will be + no solutions. Refer [1]_ for more details. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import GeneralSumOfSquares + >>> from sympy.abc import a, b, c, d, e + >>> GeneralSumOfSquares(a**2 + b**2 + c**2 + d**2 + e**2 - 2345).solve() + {(15, 22, 22, 24, 24)} + + By default only 1 solution is returned. Use the `limit` keyword for more: + + >>> sorted(GeneralSumOfSquares(a**2 + b**2 + c**2 + d**2 + e**2 - 2345).solve(limit=3)) + [(15, 22, 22, 24, 24), (16, 19, 24, 24, 24), (16, 20, 22, 23, 26)] + + References + ========== + + .. [1] Representing an integer as a sum of three squares, [online], + Available: + https://proofwiki.org/wiki/Integer_as_Sum_of_Three_Squares + """ + + name = 'general_sum_of_squares' + + def matches(self): + if not (self.total_degree == 2 and self.dimension >= 3): + return False + if not self.homogeneous_order: + return False + if any(k.is_Mul for k in self.coeff): + return False + return all(self.coeff[k] == 1 for k in self.coeff if k != 1) + + def solve(self, parameters=None, limit=1): + self.pre_solve(parameters) + + var = self.free_symbols + k = -int(self.coeff[1]) + n = self.dimension + + result = DiophantineSolutionSet(var, parameters=self.parameters) + + if k < 0 or limit < 1: + return result + + signs = [-1 if x.is_nonpositive else 1 for x in var] + negs = signs.count(-1) != 0 + + took = 0 + for t in sum_of_squares(k, n, zeros=True): + if negs: + result.add([signs[i]*j for i, j in enumerate(t)]) + else: + result.add(t) + took += 1 + if took == limit: + break + return result + + +class GeneralPythagorean(DiophantineEquationType): + """ + Representation of the general pythagorean equation, + `a_{1}^2x_{1}^2 + a_{2}^2x_{2}^2 + . . . + a_{n}^2x_{n}^2 - a_{n + 1}^2x_{n + 1}^2 = 0`. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import GeneralPythagorean + >>> from sympy.abc import a, b, c, d, e, x, y, z, t + >>> GeneralPythagorean(a**2 + b**2 + c**2 - d**2).solve() + {(t_0**2 + t_1**2 - t_2**2, 2*t_0*t_2, 2*t_1*t_2, t_0**2 + t_1**2 + t_2**2)} + >>> GeneralPythagorean(9*a**2 - 4*b**2 + 16*c**2 + 25*d**2 + e**2).solve(parameters=[x, y, z, t]) + {(-10*t**2 + 10*x**2 + 10*y**2 + 10*z**2, 15*t**2 + 15*x**2 + 15*y**2 + 15*z**2, 15*t*x, 12*t*y, 60*t*z)} + """ + + name = 'general_pythagorean' + + def matches(self): + if not (self.total_degree == 2 and self.dimension >= 3): + return False + if not self.homogeneous_order: + return False + if any(k.is_Mul for k in self.coeff): + return False + if all(self.coeff[k] == 1 for k in self.coeff if k != 1): + return False + if not all(is_square(abs(self.coeff[k])) for k in self.coeff): + return False + # all but one has the same sign + # e.g. 4*x**2 + y**2 - 4*z**2 + return abs(sum(sign(self.coeff[k]) for k in self.coeff)) == self.dimension - 2 + + @property + def n_parameters(self): + return self.dimension - 1 + + def solve(self, parameters=None, limit=1): + self.pre_solve(parameters) + + coeff = self.coeff + var = self.free_symbols + n = self.dimension + + if sign(coeff[var[0] ** 2]) + sign(coeff[var[1] ** 2]) + sign(coeff[var[2] ** 2]) < 0: + for key in coeff.keys(): + coeff[key] = -coeff[key] + + result = DiophantineSolutionSet(var, parameters=self.parameters) + + index = 0 + + for i, v in enumerate(var): + if sign(coeff[v ** 2]) == -1: + index = i + + m = result.parameters + + ith = sum(m_i ** 2 for m_i in m) + L = [ith - 2 * m[n - 2] ** 2] + L.extend([2 * m[i] * m[n - 2] for i in range(n - 2)]) + sol = L[:index] + [ith] + L[index:] + + lcm = 1 + for i, v in enumerate(var): + if i == index or (index > 0 and i == 0) or (index == 0 and i == 1): + lcm = ilcm(lcm, sqrt(abs(coeff[v ** 2]))) + else: + s = sqrt(coeff[v ** 2]) + lcm = ilcm(lcm, s if _odd(s) else s // 2) + + for i, v in enumerate(var): + sol[i] = (lcm * sol[i]) / sqrt(abs(coeff[v ** 2])) + + result.add(sol) + return result + + +class CubicThue(DiophantineEquationType): + """ + Representation of a cubic Thue diophantine equation. + + A cubic Thue diophantine equation is a polynomial of the form + `f(x, y) = r` of degree 3, where `x` and `y` are integers + and `r` is a rational number. + + No solver is currently implemented for this equation type. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.solvers.diophantine.diophantine import CubicThue + >>> c1 = CubicThue(x**3 + y**2 + 1) + >>> c1.matches() + True + + """ + + name = 'cubic_thue' + + def matches(self): + return self.total_degree == 3 and self.dimension == 2 + + +class GeneralSumOfEvenPowers(DiophantineEquationType): + """ + Representation of the diophantine equation + + `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0` + + where `e` is an even, integer power. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import GeneralSumOfEvenPowers + >>> from sympy.abc import a, b + >>> GeneralSumOfEvenPowers(a**4 + b**4 - (2**4 + 3**4)).solve() + {(2, 3)} + + """ + + name = 'general_sum_of_even_powers' + + def matches(self): + if not self.total_degree > 3: + return False + if self.total_degree % 2 != 0: + return False + if not all(k.is_Pow and k.exp == self.total_degree for k in self.coeff if k != 1): + return False + return all(self.coeff[k] == 1 for k in self.coeff if k != 1) + + def solve(self, parameters=None, limit=1): + self.pre_solve(parameters) + + var = self.free_symbols + coeff = self.coeff + + p = None + for q in coeff.keys(): + if q.is_Pow and coeff[q]: + p = q.exp + + k = len(var) + n = -coeff[1] + + result = DiophantineSolutionSet(var, parameters=self.parameters) + + if n < 0 or limit < 1: + return result + + sign = [-1 if x.is_nonpositive else 1 for x in var] + negs = sign.count(-1) != 0 + + took = 0 + for t in power_representation(n, p, k): + if negs: + result.add([sign[i]*j for i, j in enumerate(t)]) + else: + result.add(t) + took += 1 + if took == limit: + break + return result + +# these types are known (but not necessarily handled) +# note that order is important here (in the current solver state) +all_diop_classes = [ + Linear, + Univariate, + BinaryQuadratic, + InhomogeneousTernaryQuadratic, + HomogeneousTernaryQuadraticNormal, + HomogeneousTernaryQuadratic, + InhomogeneousGeneralQuadratic, + HomogeneousGeneralQuadratic, + GeneralSumOfSquares, + GeneralPythagorean, + CubicThue, + GeneralSumOfEvenPowers, +] + +diop_known = {diop_class.name for diop_class in all_diop_classes} + + +def _remove_gcd(*x): + try: + g = igcd(*x) + except ValueError: + fx = list(filter(None, x)) + if len(fx) < 2: + return x + g = igcd(*[i.as_content_primitive()[0] for i in fx]) + except TypeError: + raise TypeError('_remove_gcd(a,b,c) or _remove_gcd(*container)') + if g == 1: + return x + return tuple([i//g for i in x]) + + +def _rational_pq(a, b): + # return `(numer, denom)` for a/b; sign in numer and gcd removed + return _remove_gcd(sign(b)*a, abs(b)) + + +def _nint_or_floor(p, q): + # return nearest int to p/q; in case of tie return floor(p/q) + w, r = divmod(p, q) + if abs(r) <= abs(q)//2: + return w + return w + 1 + + +def _odd(i): + return i % 2 != 0 + + +def _even(i): + return i % 2 == 0 + + +def diophantine(eq, param=symbols("t", integer=True), syms=None, + permute=False): + """ + Simplify the solution procedure of diophantine equation ``eq`` by + converting it into a product of terms which should equal zero. + + Explanation + =========== + + For example, when solving, `x^2 - y^2 = 0` this is treated as + `(x + y)(x - y) = 0` and `x + y = 0` and `x - y = 0` are solved + independently and combined. Each term is solved by calling + ``diop_solve()``. (Although it is possible to call ``diop_solve()`` + directly, one must be careful to pass an equation in the correct + form and to interpret the output correctly; ``diophantine()`` is + the public-facing function to use in general.) + + Output of ``diophantine()`` is a set of tuples. The elements of the + tuple are the solutions for each variable in the equation and + are arranged according to the alphabetic ordering of the variables. + e.g. For an equation with two variables, `a` and `b`, the first + element of the tuple is the solution for `a` and the second for `b`. + + Usage + ===== + + ``diophantine(eq, t, syms)``: Solve the diophantine + equation ``eq``. + ``t`` is the optional parameter to be used by ``diop_solve()``. + ``syms`` is an optional list of symbols which determines the + order of the elements in the returned tuple. + + By default, only the base solution is returned. If ``permute`` is set to + True then permutations of the base solution and/or permutations of the + signs of the values will be returned when applicable. + + Details + ======= + + ``eq`` should be an expression which is assumed to be zero. + ``t`` is the parameter to be used in the solution. + + Examples + ======== + + >>> from sympy import diophantine + >>> from sympy.abc import a, b + >>> eq = a**4 + b**4 - (2**4 + 3**4) + >>> diophantine(eq) + {(2, 3)} + >>> diophantine(eq, permute=True) + {(-3, -2), (-3, 2), (-2, -3), (-2, 3), (2, -3), (2, 3), (3, -2), (3, 2)} + + >>> from sympy.abc import x, y, z + >>> diophantine(x**2 - y**2) + {(t_0, -t_0), (t_0, t_0)} + + >>> diophantine(x*(2*x + 3*y - z)) + {(0, n1, n2), (t_0, t_1, 2*t_0 + 3*t_1)} + >>> diophantine(x**2 + 3*x*y + 4*x) + {(0, n1), (-3*t_0 - 4, t_0)} + + See Also + ======== + + diop_solve + sympy.utilities.iterables.permute_signs + sympy.utilities.iterables.signed_permutations + """ + + eq = _sympify(eq) + + if isinstance(eq, Eq): + eq = eq.lhs - eq.rhs + + try: + var = list(eq.expand(force=True).free_symbols) + var.sort(key=default_sort_key) + if syms: + if not is_sequence(syms): + raise TypeError( + 'syms should be given as a sequence, e.g. a list') + syms = [i for i in syms if i in var] + if syms != var: + dict_sym_index = dict(zip(syms, range(len(syms)))) + return {tuple([t[dict_sym_index[i]] for i in var]) + for t in diophantine(eq, param, permute=permute)} + n, d = eq.as_numer_denom() + if n.is_number: + return set() + if not d.is_number: + dsol = diophantine(d) + good = diophantine(n) - dsol + return {s for s in good if _mexpand(d.subs(zip(var, s)))} + eq = factor_terms(n) + assert not eq.is_number + eq = eq.as_independent(*var, as_Add=False)[1] + p = Poly(eq) + assert not any(g.is_number for g in p.gens) + eq = p.as_expr() + assert eq.is_polynomial() + except (GeneratorsNeeded, AssertionError): + raise TypeError(filldedent(''' + Equation should be a polynomial with Rational coefficients.''')) + + # permute only sign + do_permute_signs = False + # permute sign and values + do_permute_signs_var = False + # permute few signs + permute_few_signs = False + try: + # if we know that factoring should not be attempted, skip + # the factoring step + v, c, t = classify_diop(eq) + + # check for permute sign + if permute: + len_var = len(v) + permute_signs_for = [ + GeneralSumOfSquares.name, + GeneralSumOfEvenPowers.name] + permute_signs_check = [ + HomogeneousTernaryQuadratic.name, + HomogeneousTernaryQuadraticNormal.name, + BinaryQuadratic.name] + if t in permute_signs_for: + do_permute_signs_var = True + elif t in permute_signs_check: + # if all the variables in eq have even powers + # then do_permute_sign = True + if len_var == 3: + var_mul = list(subsets(v, 2)) + # here var_mul is like [(x, y), (x, z), (y, z)] + xy_coeff = True + x_coeff = True + var1_mul_var2 = (a[0]*a[1] for a in var_mul) + # if coeff(y*z), coeff(y*x), coeff(x*z) is not 0 then + # `xy_coeff` => True and do_permute_sign => False. + # Means no permuted solution. + for v1_mul_v2 in var1_mul_var2: + try: + coeff = c[v1_mul_v2] + except KeyError: + coeff = 0 + xy_coeff = bool(xy_coeff) and bool(coeff) + var_mul = list(subsets(v, 1)) + # here var_mul is like [(x,), (y, )] + for v1 in var_mul: + try: + coeff = c[v1[0]] + except KeyError: + coeff = 0 + x_coeff = bool(x_coeff) and bool(coeff) + if not any((xy_coeff, x_coeff)): + # means only x**2, y**2, z**2, const is present + do_permute_signs = True + elif not x_coeff: + permute_few_signs = True + elif len_var == 2: + var_mul = list(subsets(v, 2)) + # here var_mul is like [(x, y)] + xy_coeff = True + x_coeff = True + var1_mul_var2 = (x[0]*x[1] for x in var_mul) + for v1_mul_v2 in var1_mul_var2: + try: + coeff = c[v1_mul_v2] + except KeyError: + coeff = 0 + xy_coeff = bool(xy_coeff) and bool(coeff) + var_mul = list(subsets(v, 1)) + # here var_mul is like [(x,), (y, )] + for v1 in var_mul: + try: + coeff = c[v1[0]] + except KeyError: + coeff = 0 + x_coeff = bool(x_coeff) and bool(coeff) + if not any((xy_coeff, x_coeff)): + # means only x**2, y**2 and const is present + # so we can get more soln by permuting this soln. + do_permute_signs = True + elif not x_coeff: + # when coeff(x), coeff(y) is not present then signs of + # x, y can be permuted such that their sign are same + # as sign of x*y. + # e.g 1. (x_val,y_val)=> (x_val,y_val), (-x_val,-y_val) + # 2. (-x_vall, y_val)=> (-x_val,y_val), (x_val,-y_val) + permute_few_signs = True + if t == 'general_sum_of_squares': + # trying to factor such expressions will sometimes hang + terms = [(eq, 1)] + else: + raise TypeError + except (TypeError, NotImplementedError): + fl = factor_list(eq) + if fl[0].is_Rational and fl[0] != 1: + return diophantine(eq/fl[0], param=param, syms=syms, permute=permute) + terms = fl[1] + + sols = set() + + for term in terms: + + base, _ = term + var_t, _, eq_type = classify_diop(base, _dict=False) + _, base = signsimp(base, evaluate=False).as_coeff_Mul() + solution = diop_solve(base, param) + + if eq_type in [ + Linear.name, + HomogeneousTernaryQuadratic.name, + HomogeneousTernaryQuadraticNormal.name, + GeneralPythagorean.name]: + sols.add(merge_solution(var, var_t, solution)) + + elif eq_type in [ + BinaryQuadratic.name, + GeneralSumOfSquares.name, + GeneralSumOfEvenPowers.name, + Univariate.name]: + sols.update(merge_solution(var, var_t, sol) for sol in solution) + + else: + raise NotImplementedError('unhandled type: %s' % eq_type) + + sols.discard(()) + null = tuple([0]*len(var)) + # if there is no solution, return trivial solution + if not sols and eq.subs(zip(var, null)).is_zero: + if all(check_assumptions(val, **s.assumptions0) is not False for val, s in zip(null, var)): + sols.add(null) + + final_soln = set() + for sol in sols: + if all(int_valued(s) for s in sol): + if do_permute_signs: + permuted_sign = set(permute_signs(sol)) + final_soln.update(permuted_sign) + elif permute_few_signs: + lst = list(permute_signs(sol)) + lst = list(filter(lambda x: x[0]*x[1] == sol[1]*sol[0], lst)) + permuted_sign = set(lst) + final_soln.update(permuted_sign) + elif do_permute_signs_var: + permuted_sign_var = set(signed_permutations(sol)) + final_soln.update(permuted_sign_var) + else: + final_soln.add(sol) + else: + final_soln.add(sol) + return final_soln + + +def merge_solution(var, var_t, solution): + """ + This is used to construct the full solution from the solutions of sub + equations. + + Explanation + =========== + + For example when solving the equation `(x - y)(x^2 + y^2 - z^2) = 0`, + solutions for each of the equations `x - y = 0` and `x^2 + y^2 - z^2` are + found independently. Solutions for `x - y = 0` are `(x, y) = (t, t)`. But + we should introduce a value for z when we output the solution for the + original equation. This function converts `(t, t)` into `(t, t, n_{1})` + where `n_{1}` is an integer parameter. + """ + sol = [] + + if None in solution: + return () + + solution = iter(solution) + params = numbered_symbols("n", integer=True, start=1) + for v in var: + if v in var_t: + sol.append(next(solution)) + else: + sol.append(next(params)) + + for val, symb in zip(sol, var): + if check_assumptions(val, **symb.assumptions0) is False: + return () + + return tuple(sol) + + +def _diop_solve(eq, params=None): + for diop_type in all_diop_classes: + if diop_type(eq).matches(): + return diop_type(eq).solve(parameters=params) + + +def diop_solve(eq, param=symbols("t", integer=True)): + """ + Solves the diophantine equation ``eq``. + + Explanation + =========== + + Unlike ``diophantine()``, factoring of ``eq`` is not attempted. Uses + ``classify_diop()`` to determine the type of the equation and calls + the appropriate solver function. + + Use of ``diophantine()`` is recommended over other helper functions. + ``diop_solve()`` can return either a set or a tuple depending on the + nature of the equation. All non-trivial solutions are returned: assumptions + on symbols are ignored. + + Usage + ===== + + ``diop_solve(eq, t)``: Solve diophantine equation, ``eq`` using ``t`` + as a parameter if needed. + + Details + ======= + + ``eq`` should be an expression which is assumed to be zero. + ``t`` is a parameter to be used in the solution. + + Examples + ======== + + >>> from sympy.solvers.diophantine import diop_solve + >>> from sympy.abc import x, y, z, w + >>> diop_solve(2*x + 3*y - 5) + (3*t_0 - 5, 5 - 2*t_0) + >>> diop_solve(4*x + 3*y - 4*z + 5) + (t_0, 8*t_0 + 4*t_1 + 5, 7*t_0 + 3*t_1 + 5) + >>> diop_solve(x + 3*y - 4*z + w - 6) + (t_0, t_0 + t_1, 6*t_0 + 5*t_1 + 4*t_2 - 6, 5*t_0 + 4*t_1 + 3*t_2 - 6) + >>> diop_solve(x**2 + y**2 - 5) + {(-2, -1), (-2, 1), (-1, -2), (-1, 2), (1, -2), (1, 2), (2, -1), (2, 1)} + + + See Also + ======== + + diophantine() + """ + var, coeff, eq_type = classify_diop(eq, _dict=False) + + if eq_type == Linear.name: + return diop_linear(eq, param) + + elif eq_type == BinaryQuadratic.name: + return diop_quadratic(eq, param) + + elif eq_type == HomogeneousTernaryQuadratic.name: + return diop_ternary_quadratic(eq, parameterize=True) + + elif eq_type == HomogeneousTernaryQuadraticNormal.name: + return diop_ternary_quadratic_normal(eq, parameterize=True) + + elif eq_type == GeneralPythagorean.name: + return diop_general_pythagorean(eq, param) + + elif eq_type == Univariate.name: + return diop_univariate(eq) + + elif eq_type == GeneralSumOfSquares.name: + return diop_general_sum_of_squares(eq, limit=S.Infinity) + + elif eq_type == GeneralSumOfEvenPowers.name: + return diop_general_sum_of_even_powers(eq, limit=S.Infinity) + + if eq_type is not None and eq_type not in diop_known: + raise ValueError(filldedent(''' + Although this type of equation was identified, it is not yet + handled. It should, however, be listed in `diop_known` at the + top of this file. Developers should see comments at the end of + `classify_diop`. + ''')) # pragma: no cover + else: + raise NotImplementedError( + 'No solver has been written for %s.' % eq_type) + + +def classify_diop(eq, _dict=True): + # docstring supplied externally + + matched = False + diop_type = None + for diop_class in all_diop_classes: + diop_type = diop_class(eq) + if diop_type.matches(): + matched = True + break + + if matched: + return diop_type.free_symbols, dict(diop_type.coeff) if _dict else diop_type.coeff, diop_type.name + + # new diop type instructions + # -------------------------- + # if this error raises and the equation *can* be classified, + # * it should be identified in the if-block above + # * the type should be added to the diop_known + # if a solver can be written for it, + # * a dedicated handler should be written (e.g. diop_linear) + # * it should be passed to that handler in diop_solve + raise NotImplementedError(filldedent(''' + This equation is not yet recognized or else has not been + simplified sufficiently to put it in a form recognized by + diop_classify().''')) + + +classify_diop.func_doc = ( # type: ignore + ''' + Helper routine used by diop_solve() to find information about ``eq``. + + Explanation + =========== + + Returns a tuple containing the type of the diophantine equation + along with the variables (free symbols) and their coefficients. + Variables are returned as a list and coefficients are returned + as a dict with the key being the respective term and the constant + term is keyed to 1. The type is one of the following: + + * %s + + Usage + ===== + + ``classify_diop(eq)``: Return variables, coefficients and type of the + ``eq``. + + Details + ======= + + ``eq`` should be an expression which is assumed to be zero. + ``_dict`` is for internal use: when True (default) a dict is returned, + otherwise a defaultdict which supplies 0 for missing keys is returned. + + Examples + ======== + + >>> from sympy.solvers.diophantine import classify_diop + >>> from sympy.abc import x, y, z, w, t + >>> classify_diop(4*x + 6*y - 4) + ([x, y], {1: -4, x: 4, y: 6}, 'linear') + >>> classify_diop(x + 3*y -4*z + 5) + ([x, y, z], {1: 5, x: 1, y: 3, z: -4}, 'linear') + >>> classify_diop(x**2 + y**2 - x*y + x + 5) + ([x, y], {1: 5, x: 1, x**2: 1, y**2: 1, x*y: -1}, 'binary_quadratic') + ''' % ('\n * '.join(sorted(diop_known)))) + + +def diop_linear(eq, param=symbols("t", integer=True)): + """ + Solves linear diophantine equations. + + A linear diophantine equation is an equation of the form `a_{1}x_{1} + + a_{2}x_{2} + .. + a_{n}x_{n} = 0` where `a_{1}, a_{2}, ..a_{n}` are + integer constants and `x_{1}, x_{2}, ..x_{n}` are integer variables. + + Usage + ===== + + ``diop_linear(eq)``: Returns a tuple containing solutions to the + diophantine equation ``eq``. Values in the tuple is arranged in the same + order as the sorted variables. + + Details + ======= + + ``eq`` is a linear diophantine equation which is assumed to be zero. + ``param`` is the parameter to be used in the solution. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_linear + >>> from sympy.abc import x, y, z + >>> diop_linear(2*x - 3*y - 5) # solves equation 2*x - 3*y - 5 == 0 + (3*t_0 - 5, 2*t_0 - 5) + + Here x = -3*t_0 - 5 and y = -2*t_0 - 5 + + >>> diop_linear(2*x - 3*y - 4*z -3) + (t_0, 2*t_0 + 4*t_1 + 3, -t_0 - 3*t_1 - 3) + + See Also + ======== + + diop_quadratic(), diop_ternary_quadratic(), diop_general_pythagorean(), + diop_general_sum_of_squares() + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == Linear.name: + parameters = None + if param is not None: + parameters = symbols('%s_0:%i' % (param, len(var)), integer=True) + + result = Linear(eq).solve(parameters=parameters) + + if param is None: + result = result(*[0]*len(result.parameters)) + + if len(result) > 0: + return list(result)[0] + else: + return tuple([None]*len(result.parameters)) + + +def base_solution_linear(c, a, b, t=None): + """ + Return the base solution for the linear equation, `ax + by = c`. + + Explanation + =========== + + Used by ``diop_linear()`` to find the base solution of a linear + Diophantine equation. If ``t`` is given then the parametrized solution is + returned. + + Usage + ===== + + ``base_solution_linear(c, a, b, t)``: ``a``, ``b``, ``c`` are coefficients + in `ax + by = c` and ``t`` is the parameter to be used in the solution. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import base_solution_linear + >>> from sympy.abc import t + >>> base_solution_linear(5, 2, 3) # equation 2*x + 3*y = 5 + (-5, 5) + >>> base_solution_linear(0, 5, 7) # equation 5*x + 7*y = 0 + (0, 0) + >>> base_solution_linear(5, 2, 3, t) # equation 2*x + 3*y = 5 + (3*t - 5, 5 - 2*t) + >>> base_solution_linear(0, 5, 7, t) # equation 5*x + 7*y = 0 + (7*t, -5*t) + """ + a, b, c = _remove_gcd(a, b, c) + + if c == 0: + if t is None: + return (0, 0) + if b < 0: + t = -t + return (b*t, -a*t) + + x0, y0, d = igcdex(abs(a), abs(b)) + x0 *= sign(a) + y0 *= sign(b) + if c % d: + return (None, None) + if t is None: + return (c*x0, c*y0) + if b < 0: + t = -t + return (c*x0 + b*t, c*y0 - a*t) + + +def diop_univariate(eq): + """ + Solves a univariate diophantine equations. + + Explanation + =========== + + A univariate diophantine equation is an equation of the form + `a_{0} + a_{1}x + a_{2}x^2 + .. + a_{n}x^n = 0` where `a_{1}, a_{2}, ..a_{n}` are + integer constants and `x` is an integer variable. + + Usage + ===== + + ``diop_univariate(eq)``: Returns a set containing solutions to the + diophantine equation ``eq``. + + Details + ======= + + ``eq`` is a univariate diophantine equation which is assumed to be zero. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_univariate + >>> from sympy.abc import x + >>> diop_univariate((x - 2)*(x - 3)**2) # solves equation (x - 2)*(x - 3)**2 == 0 + {(2,), (3,)} + + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == Univariate.name: + return {(int(i),) for i in solveset_real( + eq, var[0]).intersect(S.Integers)} + + +def divisible(a, b): + """ + Returns `True` if ``a`` is divisible by ``b`` and `False` otherwise. + """ + return not a % b + + +def diop_quadratic(eq, param=symbols("t", integer=True)): + """ + Solves quadratic diophantine equations. + + i.e. equations of the form `Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0`. Returns a + set containing the tuples `(x, y)` which contains the solutions. If there + are no solutions then `(None, None)` is returned. + + Usage + ===== + + ``diop_quadratic(eq, param)``: ``eq`` is a quadratic binary diophantine + equation. ``param`` is used to indicate the parameter to be used in the + solution. + + Details + ======= + + ``eq`` should be an expression which is assumed to be zero. + ``param`` is a parameter to be used in the solution. + + Examples + ======== + + >>> from sympy.abc import x, y, t + >>> from sympy.solvers.diophantine.diophantine import diop_quadratic + >>> diop_quadratic(x**2 + y**2 + 2*x + 2*y + 2, t) + {(-1, -1)} + + References + ========== + + .. [1] Methods to solve Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0, [online], + Available: https://www.alpertron.com.ar/METHODS.HTM + .. [2] Solving the equation ax^2+ bxy + cy^2 + dx + ey + f= 0, [online], + Available: https://web.archive.org/web/20160323033111/http://www.jpr2718.org/ax2p.pdf + + See Also + ======== + + diop_linear(), diop_ternary_quadratic(), diop_general_sum_of_squares(), + diop_general_pythagorean() + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == BinaryQuadratic.name: + if param is not None: + parameters = [param, Symbol("u", integer=True)] + else: + parameters = None + return set(BinaryQuadratic(eq).solve(parameters=parameters)) + + +def is_solution_quad(var, coeff, u, v): + """ + Check whether `(u, v)` is solution to the quadratic binary diophantine + equation with the variable list ``var`` and coefficient dictionary + ``coeff``. + + Not intended for use by normal users. + """ + reps = dict(zip(var, (u, v))) + eq = Add(*[j*i.xreplace(reps) for i, j in coeff.items()]) + return _mexpand(eq) == 0 + + +def diop_DN(D, N, t=symbols("t", integer=True)): + """ + Solves the equation `x^2 - Dy^2 = N`. + + Explanation + =========== + + Mainly concerned with the case `D > 0, D` is not a perfect square, + which is the same as the generalized Pell equation. The LMM + algorithm [1]_ is used to solve this equation. + + Returns one solution tuple, (`x, y)` for each class of the solutions. + Other solutions of the class can be constructed according to the + values of ``D`` and ``N``. + + Usage + ===== + + ``diop_DN(D, N, t)``: D and N are integers as in `x^2 - Dy^2 = N` and + ``t`` is the parameter to be used in the solutions. + + Details + ======= + + ``D`` and ``N`` correspond to D and N in the equation. + ``t`` is the parameter to be used in the solutions. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_DN + >>> diop_DN(13, -4) # Solves equation x**2 - 13*y**2 = -4 + [(3, 1), (393, 109), (36, 10)] + + The output can be interpreted as follows: There are three fundamental + solutions to the equation `x^2 - 13y^2 = -4` given by (3, 1), (393, 109) + and (36, 10). Each tuple is in the form (x, y), i.e. solution (3, 1) means + that `x = 3` and `y = 1`. + + >>> diop_DN(986, 1) # Solves equation x**2 - 986*y**2 = 1 + [(49299, 1570)] + + See Also + ======== + + find_DN(), diop_bf_DN() + + References + ========== + + .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. + Robertson, July 31, 2004, Pages 16 - 17. [online], Available: + https://web.archive.org/web/20160323033128/http://www.jpr2718.org/pell.pdf + """ + if D < 0: + if N == 0: + return [(0, 0)] + if N < 0: + return [] + # N > 0: + sol = [] + for d in divisors(square_factor(N), generator=True): + for x, y in cornacchia(1, int(-D), int(N // d**2)): + sol.append((d*x, d*y)) + if D == -1: + sol.append((d*y, d*x)) + return sol + + if D == 0: + if N < 0: + return [] + if N == 0: + return [(0, t)] + sN, _exact = integer_nthroot(N, 2) + if _exact: + return [(sN, t)] + return [] + + # D > 0 + sD, _exact = integer_nthroot(D, 2) + if _exact: + if N == 0: + return [(sD*t, t)] + + sol = [] + for y in range(floor(sign(N)*(N - 1)/(2*sD)) + 1): + try: + sq, _exact = integer_nthroot(D*y**2 + N, 2) + except ValueError: + _exact = False + if _exact: + sol.append((sq, y)) + return sol + + if 1 < N**2 < D: + # It is much faster to call `_special_diop_DN`. + return _special_diop_DN(D, N) + + if N == 0: + return [(0, 0)] + + sol = [] + if abs(N) == 1: + pqa = PQa(0, 1, D) + *_, prev_B, prev_G = next(pqa) + for j, (*_, a, _, _B, _G) in enumerate(pqa): + if a == 2*sD: + break + prev_B, prev_G = _B, _G + if j % 2: + if N == 1: + sol.append((prev_G, prev_B)) + return sol + if N == -1: + return [(prev_G, prev_B)] + for _ in range(j): + *_, _B, _G = next(pqa) + return [(_G, _B)] + + for f in divisors(square_factor(N), generator=True): + m = N // f**2 + am = abs(m) + for sqm in sqrt_mod(D, am, all_roots=True): + z = symmetric_residue(sqm, am) + pqa = PQa(z, am, D) + *_, prev_B, prev_G = next(pqa) + for _ in range(length(z, am, D) - 1): + _, q, *_, _B, _G = next(pqa) + if abs(q) == 1: + if prev_G**2 - D*prev_B**2 == m: + sol.append((f*prev_G, f*prev_B)) + elif a := diop_DN(D, -1): + sol.append((f*(prev_G*a[0][0] + prev_B*D*a[0][1]), + f*(prev_G*a[0][1] + prev_B*a[0][0]))) + break + prev_B, prev_G = _B, _G + return sol + + +def _special_diop_DN(D, N): + """ + Solves the equation `x^2 - Dy^2 = N` for the special case where + `1 < N**2 < D` and `D` is not a perfect square. + It is better to call `diop_DN` rather than this function, as + the former checks the condition `1 < N**2 < D`, and calls the latter only + if appropriate. + + Usage + ===== + + WARNING: Internal method. Do not call directly! + + ``_special_diop_DN(D, N)``: D and N are integers as in `x^2 - Dy^2 = N`. + + Details + ======= + + ``D`` and ``N`` correspond to D and N in the equation. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import _special_diop_DN + >>> _special_diop_DN(13, -3) # Solves equation x**2 - 13*y**2 = -3 + [(7, 2), (137, 38)] + + The output can be interpreted as follows: There are two fundamental + solutions to the equation `x^2 - 13y^2 = -3` given by (7, 2) and + (137, 38). Each tuple is in the form (x, y), i.e. solution (7, 2) means + that `x = 7` and `y = 2`. + + >>> _special_diop_DN(2445, -20) # Solves equation x**2 - 2445*y**2 = -20 + [(445, 9), (17625560, 356454), (698095554475, 14118073569)] + + See Also + ======== + + diop_DN() + + References + ========== + + .. [1] Section 4.4.4 of the following book: + Quadratic Diophantine Equations, T. Andreescu and D. Andrica, + Springer, 2015. + """ + + # The following assertion was removed for efficiency, with the understanding + # that this method is not called directly. The parent method, `diop_DN` + # is responsible for performing the appropriate checks. + # + # assert (1 < N**2 < D) and (not integer_nthroot(D, 2)[1]) + + sqrt_D = isqrt(D) + F = {N // f**2: f for f in divisors(square_factor(abs(N)), generator=True)} + P = 0 + Q = 1 + G0, G1 = 0, 1 + B0, B1 = 1, 0 + + solutions = [] + while True: + for _ in range(2): + a = (P + sqrt_D) // Q + P = a*Q - P + Q = (D - P**2) // Q + G0, G1 = G1, a*G1 + G0 + B0, B1 = B1, a*B1 + B0 + if (s := G1**2 - D*B1**2) in F: + f = F[s] + solutions.append((f*G1, f*B1)) + if Q == 1: + break + return solutions + + +def cornacchia(a:int, b:int, m:int) -> set[tuple[int, int]]: + r""" + Solves `ax^2 + by^2 = m` where `\gcd(a, b) = 1 = gcd(a, m)` and `a, b > 0`. + + Explanation + =========== + + Uses the algorithm due to Cornacchia. The method only finds primitive + solutions, i.e. ones with `\gcd(x, y) = 1`. So this method cannot be used to + find the solutions of `x^2 + y^2 = 20` since the only solution to former is + `(x, y) = (4, 2)` and it is not primitive. When `a = b`, only the + solutions with `x \leq y` are found. For more details, see the References. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import cornacchia + >>> cornacchia(2, 3, 35) # equation 2x**2 + 3y**2 = 35 + {(2, 3), (4, 1)} + >>> cornacchia(1, 1, 25) # equation x**2 + y**2 = 25 + {(4, 3)} + + References + =========== + + .. [1] A. Nitaj, "L'algorithme de Cornacchia" + .. [2] Solving the diophantine equation ax**2 + by**2 = m by Cornacchia's + method, [online], Available: + http://www.numbertheory.org/php/cornacchia.html + + See Also + ======== + + sympy.utilities.iterables.signed_permutations + """ + # Assume gcd(a, b) = gcd(a, m) = 1 and a, b > 0 but no error checking + sols = set() + + if a + b > m: + # xy = 0 must hold if there exists a solution + if a == 1: + # y = 0 + s, _exact = iroot(m // a, 2) + if _exact: + sols.add((int(s), 0)) + if a == b: + # only keep one solution + return sols + if m % b == 0: + # x = 0 + s, _exact = iroot(m // b, 2) + if _exact: + sols.add((0, int(s))) + return sols + + # the original cornacchia + for t in sqrt_mod_iter(-b*invert(a, m), m): + if t < m // 2: + continue + u, r = m, t + while (m1 := m - a*r**2) <= 0: + u, r = r, u % r + m1, _r = divmod(m1, b) + if _r: + continue + s, _exact = iroot(m1, 2) + if _exact: + if a == b and r < s: + r, s = s, r + sols.add((int(r), int(s))) + return sols + + +def PQa(P_0, Q_0, D): + r""" + Returns useful information needed to solve the Pell equation. + + Explanation + =========== + + There are six sequences of integers defined related to the continued + fraction representation of `\\frac{P + \sqrt{D}}{Q}`, namely {`P_{i}`}, + {`Q_{i}`}, {`a_{i}`},{`A_{i}`}, {`B_{i}`}, {`G_{i}`}. ``PQa()`` Returns + these values as a 6-tuple in the same order as mentioned above. Refer [1]_ + for more detailed information. + + Usage + ===== + + ``PQa(P_0, Q_0, D)``: ``P_0``, ``Q_0`` and ``D`` are integers corresponding + to `P_{0}`, `Q_{0}` and `D` in the continued fraction + `\\frac{P_{0} + \sqrt{D}}{Q_{0}}`. + Also it's assumed that `P_{0}^2 == D mod(|Q_{0}|)` and `D` is square free. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import PQa + >>> pqa = PQa(13, 4, 5) # (13 + sqrt(5))/4 + >>> next(pqa) # (P_0, Q_0, a_0, A_0, B_0, G_0) + (13, 4, 3, 3, 1, -1) + >>> next(pqa) # (P_1, Q_1, a_1, A_1, B_1, G_1) + (-1, 1, 1, 4, 1, 3) + + References + ========== + + .. [1] Solving the generalized Pell equation x^2 - Dy^2 = N, John P. + Robertson, July 31, 2004, Pages 4 - 8. https://web.archive.org/web/20160323033128/http://www.jpr2718.org/pell.pdf + """ + sqD = isqrt(D) + A2 = B1 = 0 + A1 = B2 = 1 + G1 = Q_0 + G2 = -P_0 + P_i = P_0 + Q_i = Q_0 + + while True: + a_i = (P_i + sqD) // Q_i + A1, A2 = a_i*A1 + A2, A1 + B1, B2 = a_i*B1 + B2, B1 + G1, G2 = a_i*G1 + G2, G1 + yield P_i, Q_i, a_i, A1, B1, G1 + + P_i = a_i*Q_i - P_i + Q_i = (D - P_i**2) // Q_i + + +def diop_bf_DN(D, N, t=symbols("t", integer=True)): + r""" + Uses brute force to solve the equation, `x^2 - Dy^2 = N`. + + Explanation + =========== + + Mainly concerned with the generalized Pell equation which is the case when + `D > 0, D` is not a perfect square. For more information on the case refer + [1]_. Let `(t, u)` be the minimal positive solution of the equation + `x^2 - Dy^2 = 1`. Then this method requires + `\sqrt{\\frac{\mid N \mid (t \pm 1)}{2D}}` to be small. + + Usage + ===== + + ``diop_bf_DN(D, N, t)``: ``D`` and ``N`` are coefficients in + `x^2 - Dy^2 = N` and ``t`` is the parameter to be used in the solutions. + + Details + ======= + + ``D`` and ``N`` correspond to D and N in the equation. + ``t`` is the parameter to be used in the solutions. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_bf_DN + >>> diop_bf_DN(13, -4) + [(3, 1), (-3, 1), (36, 10)] + >>> diop_bf_DN(986, 1) + [(49299, 1570)] + + See Also + ======== + + diop_DN() + + References + ========== + + .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. + Robertson, July 31, 2004, Page 15. https://web.archive.org/web/20160323033128/http://www.jpr2718.org/pell.pdf + """ + D = as_int(D) + N = as_int(N) + + sol = [] + a = diop_DN(D, 1) + u = a[0][0] + + if N == 0: + if D < 0: + return [(0, 0)] + if D == 0: + return [(0, t)] + sD, _exact = integer_nthroot(D, 2) + if _exact: + return [(sD*t, t), (-sD*t, t)] + return [(0, 0)] + + if abs(N) == 1: + return diop_DN(D, N) + + if N > 1: + L1 = 0 + L2 = integer_nthroot(int(N*(u - 1)/(2*D)), 2)[0] + 1 + else: # N < -1 + L1, _exact = integer_nthroot(-int(N/D), 2) + if not _exact: + L1 += 1 + L2 = integer_nthroot(-int(N*(u + 1)/(2*D)), 2)[0] + 1 + + for y in range(L1, L2): + try: + x, _exact = integer_nthroot(N + D*y**2, 2) + except ValueError: + _exact = False + if _exact: + sol.append((x, y)) + if not equivalent(x, y, -x, y, D, N): + sol.append((-x, y)) + + return sol + + +def equivalent(u, v, r, s, D, N): + """ + Returns True if two solutions `(u, v)` and `(r, s)` of `x^2 - Dy^2 = N` + belongs to the same equivalence class and False otherwise. + + Explanation + =========== + + Two solutions `(u, v)` and `(r, s)` to the above equation fall to the same + equivalence class iff both `(ur - Dvs)` and `(us - vr)` are divisible by + `N`. See reference [1]_. No test is performed to test whether `(u, v)` and + `(r, s)` are actually solutions to the equation. User should take care of + this. + + Usage + ===== + + ``equivalent(u, v, r, s, D, N)``: `(u, v)` and `(r, s)` are two solutions + of the equation `x^2 - Dy^2 = N` and all parameters involved are integers. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import equivalent + >>> equivalent(18, 5, -18, -5, 13, -1) + True + >>> equivalent(3, 1, -18, 393, 109, -4) + False + + References + ========== + + .. [1] Solving the generalized Pell equation x**2 - D*y**2 = N, John P. + Robertson, July 31, 2004, Page 12. https://web.archive.org/web/20160323033128/http://www.jpr2718.org/pell.pdf + + """ + return divisible(u*r - D*v*s, N) and divisible(u*s - v*r, N) + + +def length(P, Q, D): + r""" + Returns the (length of aperiodic part + length of periodic part) of + continued fraction representation of `\\frac{P + \sqrt{D}}{Q}`. + + It is important to remember that this does NOT return the length of the + periodic part but the sum of the lengths of the two parts as mentioned + above. + + Usage + ===== + + ``length(P, Q, D)``: ``P``, ``Q`` and ``D`` are integers corresponding to + the continued fraction `\\frac{P + \sqrt{D}}{Q}`. + + Details + ======= + + ``P``, ``D`` and ``Q`` corresponds to P, D and Q in the continued fraction, + `\\frac{P + \sqrt{D}}{Q}`. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import length + >>> length(-2, 4, 5) # (-2 + sqrt(5))/4 + 3 + >>> length(-5, 4, 17) # (-5 + sqrt(17))/4 + 4 + + See Also + ======== + sympy.ntheory.continued_fraction.continued_fraction_periodic + """ + from sympy.ntheory.continued_fraction import continued_fraction_periodic + v = continued_fraction_periodic(P, Q, D) + if isinstance(v[-1], list): + rpt = len(v[-1]) + nonrpt = len(v) - 1 + else: + rpt = 0 + nonrpt = len(v) + return rpt + nonrpt + + +def transformation_to_DN(eq): + """ + This function transforms general quadratic, + `ax^2 + bxy + cy^2 + dx + ey + f = 0` + to more easy to deal with `X^2 - DY^2 = N` form. + + Explanation + =========== + + This is used to solve the general quadratic equation by transforming it to + the latter form. Refer to [1]_ for more detailed information on the + transformation. This function returns a tuple (A, B) where A is a 2 X 2 + matrix and B is a 2 X 1 matrix such that, + + Transpose([x y]) = A * Transpose([X Y]) + B + + Usage + ===== + + ``transformation_to_DN(eq)``: where ``eq`` is the quadratic to be + transformed. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.solvers.diophantine.diophantine import transformation_to_DN + >>> A, B = transformation_to_DN(x**2 - 3*x*y - y**2 - 2*y + 1) + >>> A + Matrix([ + [1/26, 3/26], + [ 0, 1/13]]) + >>> B + Matrix([ + [-6/13], + [-4/13]]) + + A, B returned are such that Transpose((x y)) = A * Transpose((X Y)) + B. + Substituting these values for `x` and `y` and a bit of simplifying work + will give an equation of the form `x^2 - Dy^2 = N`. + + >>> from sympy.abc import X, Y + >>> from sympy import Matrix, simplify + >>> u = (A*Matrix([X, Y]) + B)[0] # Transformation for x + >>> u + X/26 + 3*Y/26 - 6/13 + >>> v = (A*Matrix([X, Y]) + B)[1] # Transformation for y + >>> v + Y/13 - 4/13 + + Next we will substitute these formulas for `x` and `y` and do + ``simplify()``. + + >>> eq = simplify((x**2 - 3*x*y - y**2 - 2*y + 1).subs(zip((x, y), (u, v)))) + >>> eq + X**2/676 - Y**2/52 + 17/13 + + By multiplying the denominator appropriately, we can get a Pell equation + in the standard form. + + >>> eq * 676 + X**2 - 13*Y**2 + 884 + + If only the final equation is needed, ``find_DN()`` can be used. + + See Also + ======== + + find_DN() + + References + ========== + + .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, + John P.Robertson, May 8, 2003, Page 7 - 11. + https://web.archive.org/web/20160323033111/http://www.jpr2718.org/ax2p.pdf + """ + + var, coeff, diop_type = classify_diop(eq, _dict=False) + if diop_type == BinaryQuadratic.name: + return _transformation_to_DN(var, coeff) + + +def _transformation_to_DN(var, coeff): + + x, y = var + + a = coeff[x**2] + b = coeff[x*y] + c = coeff[y**2] + d = coeff[x] + e = coeff[y] + f = coeff[1] + + a, b, c, d, e, f = [as_int(i) for i in _remove_gcd(a, b, c, d, e, f)] + + X, Y = symbols("X, Y", integer=True) + + if b: + B, C = _rational_pq(2*a, b) + A, T = _rational_pq(a, B**2) + + # eq_1 = A*B*X**2 + B*(c*T - A*C**2)*Y**2 + d*T*X + (B*e*T - d*T*C)*Y + f*T*B + coeff = {X**2: A*B, X*Y: 0, Y**2: B*(c*T - A*C**2), X: d*T, Y: B*e*T - d*T*C, 1: f*T*B} + A_0, B_0 = _transformation_to_DN([X, Y], coeff) + return Matrix(2, 2, [S.One/B, -S(C)/B, 0, 1])*A_0, Matrix(2, 2, [S.One/B, -S(C)/B, 0, 1])*B_0 + + if d: + B, C = _rational_pq(2*a, d) + A, T = _rational_pq(a, B**2) + + # eq_2 = A*X**2 + c*T*Y**2 + e*T*Y + f*T - A*C**2 + coeff = {X**2: A, X*Y: 0, Y**2: c*T, X: 0, Y: e*T, 1: f*T - A*C**2} + A_0, B_0 = _transformation_to_DN([X, Y], coeff) + return Matrix(2, 2, [S.One/B, 0, 0, 1])*A_0, Matrix(2, 2, [S.One/B, 0, 0, 1])*B_0 + Matrix([-S(C)/B, 0]) + + if e: + B, C = _rational_pq(2*c, e) + A, T = _rational_pq(c, B**2) + + # eq_3 = a*T*X**2 + A*Y**2 + f*T - A*C**2 + coeff = {X**2: a*T, X*Y: 0, Y**2: A, X: 0, Y: 0, 1: f*T - A*C**2} + A_0, B_0 = _transformation_to_DN([X, Y], coeff) + return Matrix(2, 2, [1, 0, 0, S.One/B])*A_0, Matrix(2, 2, [1, 0, 0, S.One/B])*B_0 + Matrix([0, -S(C)/B]) + + # TODO: pre-simplification: Not necessary but may simplify + # the equation. + return Matrix(2, 2, [S.One/a, 0, 0, 1]), Matrix([0, 0]) + + +def find_DN(eq): + """ + This function returns a tuple, `(D, N)` of the simplified form, + `x^2 - Dy^2 = N`, corresponding to the general quadratic, + `ax^2 + bxy + cy^2 + dx + ey + f = 0`. + + Solving the general quadratic is then equivalent to solving the equation + `X^2 - DY^2 = N` and transforming the solutions by using the transformation + matrices returned by ``transformation_to_DN()``. + + Usage + ===== + + ``find_DN(eq)``: where ``eq`` is the quadratic to be transformed. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.solvers.diophantine.diophantine import find_DN + >>> find_DN(x**2 - 3*x*y - y**2 - 2*y + 1) + (13, -884) + + Interpretation of the output is that we get `X^2 -13Y^2 = -884` after + transforming `x^2 - 3xy - y^2 - 2y + 1` using the transformation returned + by ``transformation_to_DN()``. + + See Also + ======== + + transformation_to_DN() + + References + ========== + + .. [1] Solving the equation ax^2 + bxy + cy^2 + dx + ey + f = 0, + John P.Robertson, May 8, 2003, Page 7 - 11. + https://web.archive.org/web/20160323033111/http://www.jpr2718.org/ax2p.pdf + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + if diop_type == BinaryQuadratic.name: + return _find_DN(var, coeff) + + +def _find_DN(var, coeff): + + x, y = var + X, Y = symbols("X, Y", integer=True) + A, B = _transformation_to_DN(var, coeff) + + u = (A*Matrix([X, Y]) + B)[0] + v = (A*Matrix([X, Y]) + B)[1] + eq = x**2*coeff[x**2] + x*y*coeff[x*y] + y**2*coeff[y**2] + x*coeff[x] + y*coeff[y] + coeff[1] + + simplified = _mexpand(eq.subs(zip((x, y), (u, v)))) + + coeff = simplified.as_coefficients_dict() + + return -coeff[Y**2]/coeff[X**2], -coeff[1]/coeff[X**2] + + +def check_param(x, y, a, params): + """ + If there is a number modulo ``a`` such that ``x`` and ``y`` are both + integers, then return a parametric representation for ``x`` and ``y`` + else return (None, None). + + Here ``x`` and ``y`` are functions of ``t``. + """ + from sympy.simplify.simplify import clear_coefficients + + if x.is_number and not x.is_Integer: + return DiophantineSolutionSet([x, y], parameters=params) + + if y.is_number and not y.is_Integer: + return DiophantineSolutionSet([x, y], parameters=params) + + m, n = symbols("m, n", integer=True) + c, p = (m*x + n*y).as_content_primitive() + if a % c.q: + return DiophantineSolutionSet([x, y], parameters=params) + + # clear_coefficients(mx + b, R)[1] -> (R - b)/m + eq = clear_coefficients(x, m)[1] - clear_coefficients(y, n)[1] + junk, eq = eq.as_content_primitive() + + return _diop_solve(eq, params=params) + + +def diop_ternary_quadratic(eq, parameterize=False): + """ + Solves the general quadratic ternary form, + `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. + + Returns a tuple `(x, y, z)` which is a base solution for the above + equation. If there are no solutions, `(None, None, None)` is returned. + + Usage + ===== + + ``diop_ternary_quadratic(eq)``: Return a tuple containing a basic solution + to ``eq``. + + Details + ======= + + ``eq`` should be an homogeneous expression of degree two in three variables + and it is assumed to be zero. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.solvers.diophantine.diophantine import diop_ternary_quadratic + >>> diop_ternary_quadratic(x**2 + 3*y**2 - z**2) + (1, 0, 1) + >>> diop_ternary_quadratic(4*x**2 + 5*y**2 - z**2) + (1, 0, 2) + >>> diop_ternary_quadratic(45*x**2 - 7*y**2 - 8*x*y - z**2) + (28, 45, 105) + >>> diop_ternary_quadratic(x**2 - 49*y**2 - z**2 + 13*z*y -8*x*y) + (9, 1, 5) + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type in ( + HomogeneousTernaryQuadratic.name, + HomogeneousTernaryQuadraticNormal.name): + sol = _diop_ternary_quadratic(var, coeff) + if len(sol) > 0: + x_0, y_0, z_0 = list(sol)[0] + else: + x_0, y_0, z_0 = None, None, None + + if parameterize: + return _parametrize_ternary_quadratic( + (x_0, y_0, z_0), var, coeff) + return x_0, y_0, z_0 + + +def _diop_ternary_quadratic(_var, coeff): + eq = sum(i*coeff[i] for i in coeff) + if HomogeneousTernaryQuadratic(eq).matches(): + return HomogeneousTernaryQuadratic(eq, free_symbols=_var).solve() + elif HomogeneousTernaryQuadraticNormal(eq).matches(): + return HomogeneousTernaryQuadraticNormal(eq, free_symbols=_var).solve() + + +def transformation_to_normal(eq): + """ + Returns the transformation Matrix that converts a general ternary + quadratic equation ``eq`` (`ax^2 + by^2 + cz^2 + dxy + eyz + fxz`) + to a form without cross terms: `ax^2 + by^2 + cz^2 = 0`. This is + not used in solving ternary quadratics; it is only implemented for + the sake of completeness. + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type in ( + "homogeneous_ternary_quadratic", + "homogeneous_ternary_quadratic_normal"): + return _transformation_to_normal(var, coeff) + + +def _transformation_to_normal(var, coeff): + + _var = list(var) # copy + x, y, z = var + + if not any(coeff[i**2] for i in var): + # https://math.stackexchange.com/questions/448051/transform-quadratic-ternary-form-to-normal-form/448065#448065 + a = coeff[x*y] + b = coeff[y*z] + c = coeff[x*z] + swap = False + if not a: # b can't be 0 or else there aren't 3 vars + swap = True + a, b = b, a + T = Matrix(((1, 1, -b/a), (1, -1, -c/a), (0, 0, 1))) + if swap: + T.row_swap(0, 1) + T.col_swap(0, 1) + return T + + if coeff[x**2] == 0: + # If the coefficient of x is zero change the variables + if coeff[y**2] == 0: + _var[0], _var[2] = var[2], var[0] + T = _transformation_to_normal(_var, coeff) + T.row_swap(0, 2) + T.col_swap(0, 2) + return T + + _var[0], _var[1] = var[1], var[0] + T = _transformation_to_normal(_var, coeff) + T.row_swap(0, 1) + T.col_swap(0, 1) + return T + + # Apply the transformation x --> X - (B*Y + C*Z)/(2*A) + if coeff[x*y] != 0 or coeff[x*z] != 0: + A = coeff[x**2] + B = coeff[x*y] + C = coeff[x*z] + D = coeff[y**2] + E = coeff[y*z] + F = coeff[z**2] + + _coeff = {} + + _coeff[x**2] = 4*A**2 + _coeff[y**2] = 4*A*D - B**2 + _coeff[z**2] = 4*A*F - C**2 + _coeff[y*z] = 4*A*E - 2*B*C + _coeff[x*y] = 0 + _coeff[x*z] = 0 + + T_0 = _transformation_to_normal(_var, _coeff) + return Matrix(3, 3, [1, S(-B)/(2*A), S(-C)/(2*A), 0, 1, 0, 0, 0, 1])*T_0 + + elif coeff[y*z] != 0: + if coeff[y**2] == 0: + if coeff[z**2] == 0: + # Equations of the form A*x**2 + E*yz = 0. + # Apply transformation y -> Y + Z ans z -> Y - Z + return Matrix(3, 3, [1, 0, 0, 0, 1, 1, 0, 1, -1]) + + # Ax**2 + E*y*z + F*z**2 = 0 + _var[0], _var[2] = var[2], var[0] + T = _transformation_to_normal(_var, coeff) + T.row_swap(0, 2) + T.col_swap(0, 2) + return T + + # A*x**2 + D*y**2 + E*y*z + F*z**2 = 0, F may be zero + _var[0], _var[1] = var[1], var[0] + T = _transformation_to_normal(_var, coeff) + T.row_swap(0, 1) + T.col_swap(0, 1) + return T + + return Matrix.eye(3) + + +def parametrize_ternary_quadratic(eq): + """ + Returns the parametrized general solution for the ternary quadratic + equation ``eq`` which has the form + `ax^2 + by^2 + cz^2 + fxy + gyz + hxz = 0`. + + Examples + ======== + + >>> from sympy import Tuple, ordered + >>> from sympy.abc import x, y, z + >>> from sympy.solvers.diophantine.diophantine import parametrize_ternary_quadratic + + The parametrized solution may be returned with three parameters: + + >>> parametrize_ternary_quadratic(2*x**2 + y**2 - 2*z**2) + (p**2 - 2*q**2, -2*p**2 + 4*p*q - 4*p*r - 4*q**2, p**2 - 4*p*q + 2*q**2 - 4*q*r) + + There might also be only two parameters: + + >>> parametrize_ternary_quadratic(4*x**2 + 2*y**2 - 3*z**2) + (2*p**2 - 3*q**2, -4*p**2 + 12*p*q - 6*q**2, 4*p**2 - 8*p*q + 6*q**2) + + Notes + ===== + + Consider ``p`` and ``q`` in the previous 2-parameter + solution and observe that more than one solution can be represented + by a given pair of parameters. If `p` and ``q`` are not coprime, this is + trivially true since the common factor will also be a common factor of the + solution values. But it may also be true even when ``p`` and + ``q`` are coprime: + + >>> sol = Tuple(*_) + >>> p, q = ordered(sol.free_symbols) + >>> sol.subs([(p, 3), (q, 2)]) + (6, 12, 12) + >>> sol.subs([(q, 1), (p, 1)]) + (-1, 2, 2) + >>> sol.subs([(q, 0), (p, 1)]) + (2, -4, 4) + >>> sol.subs([(q, 1), (p, 0)]) + (-3, -6, 6) + + Except for sign and a common factor, these are equivalent to + the solution of (1, 2, 2). + + References + ========== + + .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, + London Mathematical Society Student Texts 41, Cambridge University + Press, Cambridge, 1998. + + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type in ( + "homogeneous_ternary_quadratic", + "homogeneous_ternary_quadratic_normal"): + x_0, y_0, z_0 = list(_diop_ternary_quadratic(var, coeff))[0] + return _parametrize_ternary_quadratic( + (x_0, y_0, z_0), var, coeff) + + +def _parametrize_ternary_quadratic(solution, _var, coeff): + # called for a*x**2 + b*y**2 + c*z**2 + d*x*y + e*y*z + f*x*z = 0 + assert 1 not in coeff + + x_0, y_0, z_0 = solution + + v = list(_var) # copy + + if x_0 is None: + return (None, None, None) + + if solution.count(0) >= 2: + # if there are 2 zeros the equation reduces + # to k*X**2 == 0 where X is x, y, or z so X must + # be zero, too. So there is only the trivial + # solution. + return (None, None, None) + + if x_0 == 0: + v[0], v[1] = v[1], v[0] + y_p, x_p, z_p = _parametrize_ternary_quadratic( + (y_0, x_0, z_0), v, coeff) + return x_p, y_p, z_p + + x, y, z = v + r, p, q = symbols("r, p, q", integer=True) + + eq = sum(k*v for k, v in coeff.items()) + eq_1 = _mexpand(eq.subs(zip( + (x, y, z), (r*x_0, r*y_0 + p, r*z_0 + q)))) + A, B = eq_1.as_independent(r, as_Add=True) + + + x = A*x_0 + y = (A*y_0 - _mexpand(B/r*p)) + z = (A*z_0 - _mexpand(B/r*q)) + + return _remove_gcd(x, y, z) + + +def diop_ternary_quadratic_normal(eq, parameterize=False): + """ + Solves the quadratic ternary diophantine equation, + `ax^2 + by^2 + cz^2 = 0`. + + Explanation + =========== + + Here the coefficients `a`, `b`, and `c` should be non zero. Otherwise the + equation will be a quadratic binary or univariate equation. If solvable, + returns a tuple `(x, y, z)` that satisfies the given equation. If the + equation does not have integer solutions, `(None, None, None)` is returned. + + Usage + ===== + + ``diop_ternary_quadratic_normal(eq)``: where ``eq`` is an equation of the form + `ax^2 + by^2 + cz^2 = 0`. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.solvers.diophantine.diophantine import diop_ternary_quadratic_normal + >>> diop_ternary_quadratic_normal(x**2 + 3*y**2 - z**2) + (1, 0, 1) + >>> diop_ternary_quadratic_normal(4*x**2 + 5*y**2 - z**2) + (1, 0, 2) + >>> diop_ternary_quadratic_normal(34*x**2 - 3*y**2 - 301*z**2) + (4, 9, 1) + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + if diop_type == HomogeneousTernaryQuadraticNormal.name: + sol = _diop_ternary_quadratic_normal(var, coeff) + if len(sol) > 0: + x_0, y_0, z_0 = list(sol)[0] + else: + x_0, y_0, z_0 = None, None, None + if parameterize: + return _parametrize_ternary_quadratic( + (x_0, y_0, z_0), var, coeff) + return x_0, y_0, z_0 + + +def _diop_ternary_quadratic_normal(var, coeff): + eq = sum(i * coeff[i] for i in coeff) + return HomogeneousTernaryQuadraticNormal(eq, free_symbols=var).solve() + + +def sqf_normal(a, b, c, steps=False): + """ + Return `a', b', c'`, the coefficients of the square-free normal + form of `ax^2 + by^2 + cz^2 = 0`, where `a', b', c'` are pairwise + prime. If `steps` is True then also return three tuples: + `sq`, `sqf`, and `(a', b', c')` where `sq` contains the square + factors of `a`, `b` and `c` after removing the `gcd(a, b, c)`; + `sqf` contains the values of `a`, `b` and `c` after removing + both the `gcd(a, b, c)` and the square factors. + + The solutions for `ax^2 + by^2 + cz^2 = 0` can be + recovered from the solutions of `a'x^2 + b'y^2 + c'z^2 = 0`. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import sqf_normal + >>> sqf_normal(2 * 3**2 * 5, 2 * 5 * 11, 2 * 7**2 * 11) + (11, 1, 5) + >>> sqf_normal(2 * 3**2 * 5, 2 * 5 * 11, 2 * 7**2 * 11, True) + ((3, 1, 7), (5, 55, 11), (11, 1, 5)) + + References + ========== + + .. [1] Legendre's Theorem, Legrange's Descent, + https://public.csusm.edu/aitken_html/notes/legendre.pdf + + + See Also + ======== + + reconstruct() + """ + ABC = _remove_gcd(a, b, c) + sq = tuple(square_factor(i) for i in ABC) + sqf = A, B, C = tuple([i//j**2 for i,j in zip(ABC, sq)]) + pc = igcd(A, B) + A /= pc + B /= pc + pa = igcd(B, C) + B /= pa + C /= pa + pb = igcd(A, C) + A /= pb + B /= pb + + A *= pa + B *= pb + C *= pc + + if steps: + return (sq, sqf, (A, B, C)) + else: + return A, B, C + + +def square_factor(a): + r""" + Returns an integer `c` s.t. `a = c^2k, \ c,k \in Z`. Here `k` is square + free. `a` can be given as an integer or a dictionary of factors. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import square_factor + >>> square_factor(24) + 2 + >>> square_factor(-36*3) + 6 + >>> square_factor(1) + 1 + >>> square_factor({3: 2, 2: 1, -1: 1}) # -18 + 3 + + See Also + ======== + sympy.ntheory.factor_.core + """ + f = a if isinstance(a, dict) else factorint(a) + return Mul(*[p**(e//2) for p, e in f.items()]) + + +def reconstruct(A, B, z): + """ + Reconstruct the `z` value of an equivalent solution of `ax^2 + by^2 + cz^2` + from the `z` value of a solution of the square-free normal form of the + equation, `a'*x^2 + b'*y^2 + c'*z^2`, where `a'`, `b'` and `c'` are square + free and `gcd(a', b', c') == 1`. + """ + f = factorint(igcd(A, B)) + for p, e in f.items(): + if e != 1: + raise ValueError('a and b should be square-free') + z *= p + return z + + +def ldescent(A, B): + """ + Return a non-trivial solution to `w^2 = Ax^2 + By^2` using + Lagrange's method; return None if there is no such solution. + + Parameters + ========== + + A : Integer + B : Integer + non-zero integer + + Returns + ======= + + (int, int, int) | None : a tuple `(w_0, x_0, y_0)` which is a solution to the above equation. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import ldescent + >>> ldescent(1, 1) # w^2 = x^2 + y^2 + (1, 1, 0) + >>> ldescent(4, -7) # w^2 = 4x^2 - 7y^2 + (2, -1, 0) + + This means that `x = -1, y = 0` and `w = 2` is a solution to the equation + `w^2 = 4x^2 - 7y^2` + + >>> ldescent(5, -1) # w^2 = 5x^2 - y^2 + (2, 1, -1) + + References + ========== + + .. [1] The algorithmic resolution of Diophantine equations, Nigel P. Smart, + London Mathematical Society Student Texts 41, Cambridge University + Press, Cambridge, 1998. + .. [2] Cremona, J. E., Rusin, D. (2003). Efficient Solution of Rational Conics. + Mathematics of Computation, 72(243), 1417-1441. + https://doi.org/10.1090/S0025-5718-02-01480-1 + """ + if A == 0 or B == 0: + raise ValueError("A and B must be non-zero integers") + if abs(A) > abs(B): + w, y, x = ldescent(B, A) + return w, x, y + if A == 1: + return (1, 1, 0) + if B == 1: + return (1, 0, 1) + if B == -1: # and A == -1 + return + + r = sqrt_mod(A, B) + if r is None: + return + Q = (r**2 - A) // B + if Q == 0: + return r, -1, 0 + for i in divisors(Q): + d, _exact = integer_nthroot(abs(Q) // i, 2) + if _exact: + B_0 = sign(Q)*i + W, X, Y = ldescent(A, B_0) + return _remove_gcd(-A*X + r*W, r*X - W, Y*B_0*d) + + +def descent(A, B): + """ + Returns a non-trivial solution, (x, y, z), to `x^2 = Ay^2 + Bz^2` + using Lagrange's descent method with lattice-reduction. `A` and `B` + are assumed to be valid for such a solution to exist. + + This is faster than the normal Lagrange's descent algorithm because + the Gaussian reduction is used. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import descent + >>> descent(3, 1) # x**2 = 3*y**2 + z**2 + (1, 0, 1) + + `(x, y, z) = (1, 0, 1)` is a solution to the above equation. + + >>> descent(41, -113) + (-16, -3, 1) + + References + ========== + + .. [1] Cremona, J. E., Rusin, D. (2003). Efficient Solution of Rational Conics. + Mathematics of Computation, 72(243), 1417-1441. + https://doi.org/10.1090/S0025-5718-02-01480-1 + """ + if abs(A) > abs(B): + x, y, z = descent(B, A) + return x, z, y + + if B == 1: + return (1, 0, 1) + if A == 1: + return (1, 1, 0) + if B == -A: + return (0, 1, 1) + if B == A: + x, z, y = descent(-1, A) + return (A*y, z, x) + + w = sqrt_mod(A, B) + x_0, z_0 = gaussian_reduce(w, A, B) + + t = (x_0**2 - A*z_0**2) // B + t_2 = square_factor(t) + t_1 = t // t_2**2 + + x_1, z_1, y_1 = descent(A, t_1) + + return _remove_gcd(x_0*x_1 + A*z_0*z_1, z_0*x_1 + x_0*z_1, t_1*t_2*y_1) + + +def gaussian_reduce(w:int, a:int, b:int) -> tuple[int, int]: + r""" + Returns a reduced solution `(x, z)` to the congruence + `X^2 - aZ^2 \equiv 0 \pmod{b}` so that `x^2 + |a|z^2` is as small as possible. + Here ``w`` is a solution of the congruence `x^2 \equiv a \pmod{b}`. + + This function is intended to be used only for ``descent()``. + + Explanation + =========== + + The Gaussian reduction can find the shortest vector for any norm. + So we define the special norm for the vectors `u = (u_1, u_2)` and `v = (v_1, v_2)` as follows. + + .. math :: + u \cdot v := (wu_1 + bu_2)(wv_1 + bv_2) + |a|u_1v_1 + + Note that, given the mapping `f: (u_1, u_2) \to (wu_1 + bu_2, u_1)`, + `f((u_1,u_2))` is the solution to `X^2 - aZ^2 \equiv 0 \pmod{b}`. + In other words, finding the shortest vector in this norm will yield a solution with smaller `X^2 + |a|Z^2`. + The algorithm starts from basis vectors `(0, 1)` and `(1, 0)` + (corresponding to solutions `(b, 0)` and `(w, 1)`, respectively) and finds the shortest vector. + The shortest vector does not necessarily correspond to the smallest solution, + but since ``descent()`` only wants the smallest possible solution, it is sufficient. + + Parameters + ========== + + w : int + ``w`` s.t. `w^2 \equiv a \pmod{b}` + a : int + square-free nonzero integer + b : int + square-free nonzero integer + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import gaussian_reduce + >>> from sympy.ntheory.residue_ntheory import sqrt_mod + >>> a, b = 19, 101 + >>> gaussian_reduce(sqrt_mod(a, b), a, b) # 1**2 - 19*(-4)**2 = -303 + (1, -4) + >>> a, b = 11, 14 + >>> x, z = gaussian_reduce(sqrt_mod(a, b), a, b) + >>> (x**2 - a*z**2) % b == 0 + True + + It does not always return the smallest solution. + + >>> a, b = 6, 95 + >>> min_x, min_z = 1, 4 + >>> x, z = gaussian_reduce(sqrt_mod(a, b), a, b) + >>> (x**2 - a*z**2) % b == 0 and (min_x**2 - a*min_z**2) % b == 0 + True + >>> min_x**2 + abs(a)*min_z**2 < x**2 + abs(a)*z**2 + True + + References + ========== + + .. [1] Gaussian lattice Reduction [online]. Available: + https://web.archive.org/web/20201021115213/http://home.ie.cuhk.edu.hk/~wkshum/wordpress/?p=404 + .. [2] Cremona, J. E., Rusin, D. (2003). Efficient Solution of Rational Conics. + Mathematics of Computation, 72(243), 1417-1441. + https://doi.org/10.1090/S0025-5718-02-01480-1 + """ + a = abs(a) + def _dot(u, v): + return u[0]*v[0] + a*u[1]*v[1] + + u = (b, 0) + v = (w, 1) if b*w >= 0 else (-w, -1) + # i.e., _dot(u, v) >= 0 + + if b**2 < w**2 + a: + u, v = v, u + # i.e., norm(u) >= norm(v), where norm(u) := sqrt(_dot(u, u)) + + while _dot(u, u) > (dv := _dot(v, v)): + k = _dot(u, v) // dv + u, v = v, (u[0] - k*v[0], u[1] - k*v[1]) + c = (v[0] - u[0], v[1] - u[1]) + if _dot(c, c) <= _dot(u, u) <= 2*_dot(u, v): + return c + return u + + +def holzer(x, y, z, a, b, c): + r""" + Simplify the solution `(x, y, z)` of the equation + `ax^2 + by^2 = cz^2` with `a, b, c > 0` and `z^2 \geq \mid ab \mid` to + a new reduced solution `(x', y', z')` such that `z'^2 \leq \mid ab \mid`. + + The algorithm is an interpretation of Mordell's reduction as described + on page 8 of Cremona and Rusin's paper [1]_ and the work of Mordell in + reference [2]_. + + References + ========== + + .. [1] Cremona, J. E., Rusin, D. (2003). Efficient Solution of Rational Conics. + Mathematics of Computation, 72(243), 1417-1441. + https://doi.org/10.1090/S0025-5718-02-01480-1 + .. [2] Diophantine Equations, L. J. Mordell, page 48. + + """ + + if _odd(c): + k = 2*c + else: + k = c//2 + + small = a*b*c + step = 0 + while True: + t1, t2, t3 = a*x**2, b*y**2, c*z**2 + # check that it's a solution + if t1 + t2 != t3: + if step == 0: + raise ValueError('bad starting solution') + break + x_0, y_0, z_0 = x, y, z + if max(t1, t2, t3) <= small: + # Holzer condition + break + + uv = u, v = base_solution_linear(k, y_0, -x_0) + if None in uv: + break + + p, q = -(a*u*x_0 + b*v*y_0), c*z_0 + r = Rational(p, q) + if _even(c): + w = _nint_or_floor(p, q) + assert abs(w - r) <= S.Half + else: + w = p//q # floor + if _odd(a*u + b*v + c*w): + w += 1 + assert abs(w - r) <= S.One + + A = (a*u**2 + b*v**2 + c*w**2) + B = (a*u*x_0 + b*v*y_0 + c*w*z_0) + x = Rational(x_0*A - 2*u*B, k) + y = Rational(y_0*A - 2*v*B, k) + z = Rational(z_0*A - 2*w*B, k) + assert all(i.is_Integer for i in (x, y, z)) + step += 1 + + return tuple([int(i) for i in (x_0, y_0, z_0)]) + + +def diop_general_pythagorean(eq, param=symbols("m", integer=True)): + """ + Solves the general pythagorean equation, + `a_{1}^2x_{1}^2 + a_{2}^2x_{2}^2 + . . . + a_{n}^2x_{n}^2 - a_{n + 1}^2x_{n + 1}^2 = 0`. + + Returns a tuple which contains a parametrized solution to the equation, + sorted in the same order as the input variables. + + Usage + ===== + + ``diop_general_pythagorean(eq, param)``: where ``eq`` is a general + pythagorean equation which is assumed to be zero and ``param`` is the base + parameter used to construct other parameters by subscripting. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_general_pythagorean + >>> from sympy.abc import a, b, c, d, e + >>> diop_general_pythagorean(a**2 + b**2 + c**2 - d**2) + (m1**2 + m2**2 - m3**2, 2*m1*m3, 2*m2*m3, m1**2 + m2**2 + m3**2) + >>> diop_general_pythagorean(9*a**2 - 4*b**2 + 16*c**2 + 25*d**2 + e**2) + (10*m1**2 + 10*m2**2 + 10*m3**2 - 10*m4**2, 15*m1**2 + 15*m2**2 + 15*m3**2 + 15*m4**2, 15*m1*m4, 12*m2*m4, 60*m3*m4) + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == GeneralPythagorean.name: + if param is None: + params = None + else: + params = symbols('%s1:%i' % (param, len(var)), integer=True) + return list(GeneralPythagorean(eq).solve(parameters=params))[0] + + +def diop_general_sum_of_squares(eq, limit=1): + r""" + Solves the equation `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. + + Returns at most ``limit`` number of solutions. + + Usage + ===== + + ``general_sum_of_squares(eq, limit)`` : Here ``eq`` is an expression which + is assumed to be zero. Also, ``eq`` should be in the form, + `x_{1}^2 + x_{2}^2 + . . . + x_{n}^2 - k = 0`. + + Details + ======= + + When `n = 3` if `k = 4^a(8m + 7)` for some `a, m \in Z` then there will be + no solutions. Refer to [1]_ for more details. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_general_sum_of_squares + >>> from sympy.abc import a, b, c, d, e + >>> diop_general_sum_of_squares(a**2 + b**2 + c**2 + d**2 + e**2 - 2345) + {(15, 22, 22, 24, 24)} + + Reference + ========= + + .. [1] Representing an integer as a sum of three squares, [online], + Available: + https://proofwiki.org/wiki/Integer_as_Sum_of_Three_Squares + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == GeneralSumOfSquares.name: + return set(GeneralSumOfSquares(eq).solve(limit=limit)) + + +def diop_general_sum_of_even_powers(eq, limit=1): + """ + Solves the equation `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0` + where `e` is an even, integer power. + + Returns at most ``limit`` number of solutions. + + Usage + ===== + + ``general_sum_of_even_powers(eq, limit)`` : Here ``eq`` is an expression which + is assumed to be zero. Also, ``eq`` should be in the form, + `x_{1}^e + x_{2}^e + . . . + x_{n}^e - k = 0`. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import diop_general_sum_of_even_powers + >>> from sympy.abc import a, b + >>> diop_general_sum_of_even_powers(a**4 + b**4 - (2**4 + 3**4)) + {(2, 3)} + + See Also + ======== + + power_representation + """ + var, coeff, diop_type = classify_diop(eq, _dict=False) + + if diop_type == GeneralSumOfEvenPowers.name: + return set(GeneralSumOfEvenPowers(eq).solve(limit=limit)) + + +## Functions below this comment can be more suitably grouped under +## an Additive number theory module rather than the Diophantine +## equation module. + + +def partition(n, k=None, zeros=False): + """ + Returns a generator that can be used to generate partitions of an integer + `n`. + + Explanation + =========== + + A partition of `n` is a set of positive integers which add up to `n`. For + example, partitions of 3 are 3, 1 + 2, 1 + 1 + 1. A partition is returned + as a tuple. If ``k`` equals None, then all possible partitions are returned + irrespective of their size, otherwise only the partitions of size ``k`` are + returned. If the ``zero`` parameter is set to True then a suitable + number of zeros are added at the end of every partition of size less than + ``k``. + + ``zero`` parameter is considered only if ``k`` is not None. When the + partitions are over, the last `next()` call throws the ``StopIteration`` + exception, so this function should always be used inside a try - except + block. + + Details + ======= + + ``partition(n, k)``: Here ``n`` is a positive integer and ``k`` is the size + of the partition which is also positive integer. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import partition + >>> f = partition(5) + >>> next(f) + (1, 1, 1, 1, 1) + >>> next(f) + (1, 1, 1, 2) + >>> g = partition(5, 3) + >>> next(g) + (1, 1, 3) + >>> next(g) + (1, 2, 2) + >>> g = partition(5, 3, zeros=True) + >>> next(g) + (0, 0, 5) + + """ + if not zeros or k is None: + for i in ordered_partitions(n, k): + yield tuple(i) + else: + for m in range(1, k + 1): + for i in ordered_partitions(n, m): + i = tuple(i) + yield (0,)*(k - len(i)) + i + + +def prime_as_sum_of_two_squares(p): + """ + Represent a prime `p` as a unique sum of two squares; this can + only be done if the prime is congruent to 1 mod 4. + + Parameters + ========== + + p : Integer + A prime that is congruent to 1 mod 4 + + Returns + ======= + + (int, int) | None : Pair of positive integers ``(x, y)`` satisfying ``x**2 + y**2 = p``. + None if ``p`` is not congruent to 1 mod 4. + + Raises + ====== + + ValueError + If ``p`` is not prime number + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import prime_as_sum_of_two_squares + >>> prime_as_sum_of_two_squares(7) # can't be done + >>> prime_as_sum_of_two_squares(5) + (1, 2) + + Reference + ========= + + .. [1] Representing a number as a sum of four squares, [online], + Available: https://schorn.ch/lagrange.html + + See Also + ======== + + sum_of_squares + + """ + p = as_int(p) + if p % 4 != 1: + return + if not isprime(p): + raise ValueError("p should be a prime number") + + if p % 8 == 5: + # Legendre symbol (2/p) == -1 if p % 8 in [3, 5] + b = 2 + elif p % 12 == 5: + # Legendre symbol (3/p) == -1 if p % 12 in [5, 7] + b = 3 + elif p % 5 in [2, 3]: + # Legendre symbol (5/p) == -1 if p % 5 in [2, 3] + b = 5 + else: + b = 7 + while jacobi(b, p) == 1: + b = nextprime(b) + + b = pow(b, p >> 2, p) + a = p + while b**2 > p: + a, b = b, a % b + return (int(a % b), int(b)) # convert from long + + +def sum_of_three_squares(n): + r""" + Returns a 3-tuple $(a, b, c)$ such that $a^2 + b^2 + c^2 = n$ and + $a, b, c \geq 0$. + + Returns None if $n = 4^a(8m + 7)$ for some `a, m \in \mathbb{Z}`. See + [1]_ for more details. + + Parameters + ========== + + n : Integer + non-negative integer + + Returns + ======= + + (int, int, int) | None : 3-tuple non-negative integers ``(a, b, c)`` satisfying ``a**2 + b**2 + c**2 = n``. + a,b,c are sorted in ascending order. ``None`` if no such ``(a,b,c)``. + + Raises + ====== + + ValueError + If ``n`` is a negative integer + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import sum_of_three_squares + >>> sum_of_three_squares(44542) + (18, 37, 207) + + References + ========== + + .. [1] Representing a number as a sum of three squares, [online], + Available: https://schorn.ch/lagrange.html + + See Also + ======== + + power_representation : + ``sum_of_three_squares(n)`` is one of the solutions output by ``power_representation(n, 2, 3, zeros=True)`` + + """ + # https://math.stackexchange.com/questions/483101/rabin-and-shallit-algorithm/651425#651425 + # discusses these numbers (except for 1, 2, 3) as the exceptions of H&L's conjecture that + # Every sufficiently large number n is either a square or the sum of a prime and a square. + special = {1: (0, 0, 1), 2: (0, 1, 1), 3: (1, 1, 1), 10: (0, 1, 3), 34: (3, 3, 4), + 58: (0, 3, 7), 85: (0, 6, 7), 130: (0, 3, 11), 214: (3, 6, 13), 226: (8, 9, 9), + 370: (8, 9, 15), 526: (6, 7, 21), 706: (15, 15, 16), 730: (0, 1, 27), + 1414: (6, 17, 33), 1906: (13, 21, 36), 2986: (21, 32, 39), 9634: (56, 57, 57)} + n = as_int(n) + if n < 0: + raise ValueError("n should be a non-negative integer") + if n == 0: + return (0, 0, 0) + n, v = remove(n, 4) + v = 1 << v + if n % 8 == 7: + return + if n in special: + return tuple([v*i for i in special[n]]) + + s, _exact = integer_nthroot(n, 2) + if _exact: + return (0, 0, v*s) + if n % 8 == 3: + if not s % 2: + s -= 1 + for x in range(s, -1, -2): + N = (n - x**2) // 2 + if isprime(N): + # n % 8 == 3 and x % 2 == 1 => N % 4 == 1 + y, z = prime_as_sum_of_two_squares(N) + return tuple(sorted([v*x, v*(y + z), v*abs(y - z)])) + # We will never reach this point because there must be a solution. + assert False + + # assert n % 4 in [1, 2] + if not((n % 2) ^ (s % 2)): + s -= 1 + for x in range(s, -1, -2): + N = n - x**2 + if isprime(N): + # assert N % 4 == 1 + y, z = prime_as_sum_of_two_squares(N) + return tuple(sorted([v*x, v*y, v*z])) + # We will never reach this point because there must be a solution. + assert False + + +def sum_of_four_squares(n): + r""" + Returns a 4-tuple `(a, b, c, d)` such that `a^2 + b^2 + c^2 + d^2 = n`. + Here `a, b, c, d \geq 0`. + + Parameters + ========== + + n : Integer + non-negative integer + + Returns + ======= + + (int, int, int, int) : 4-tuple non-negative integers ``(a, b, c, d)`` satisfying ``a**2 + b**2 + c**2 + d**2 = n``. + a,b,c,d are sorted in ascending order. + + Raises + ====== + + ValueError + If ``n`` is a negative integer + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import sum_of_four_squares + >>> sum_of_four_squares(3456) + (8, 8, 32, 48) + >>> sum_of_four_squares(1294585930293) + (0, 1234, 2161, 1137796) + + References + ========== + + .. [1] Representing a number as a sum of four squares, [online], + Available: https://schorn.ch/lagrange.html + + See Also + ======== + + power_representation : + ``sum_of_four_squares(n)`` is one of the solutions output by ``power_representation(n, 2, 4, zeros=True)`` + + """ + n = as_int(n) + if n < 0: + raise ValueError("n should be a non-negative integer") + if n == 0: + return (0, 0, 0, 0) + # remove factors of 4 since a solution in terms of 3 squares is + # going to be returned; this is also done in sum_of_three_squares, + # but it needs to be done here to select d + n, v = remove(n, 4) + v = 1 << v + if n % 8 == 7: + d = 2 + n = n - 4 + elif n % 8 in (2, 6): + d = 1 + n = n - 1 + else: + d = 0 + x, y, z = sum_of_three_squares(n) # sorted + return tuple(sorted([v*d, v*x, v*y, v*z])) + + +def power_representation(n, p, k, zeros=False): + r""" + Returns a generator for finding k-tuples of integers, + `(n_{1}, n_{2}, . . . n_{k})`, such that + `n = n_{1}^p + n_{2}^p + . . . n_{k}^p`. + + Usage + ===== + + ``power_representation(n, p, k, zeros)``: Represent non-negative number + ``n`` as a sum of ``k`` ``p``\ th powers. If ``zeros`` is true, then the + solutions is allowed to contain zeros. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import power_representation + + Represent 1729 as a sum of two cubes: + + >>> f = power_representation(1729, 3, 2) + >>> next(f) + (9, 10) + >>> next(f) + (1, 12) + + If the flag `zeros` is True, the solution may contain tuples with + zeros; any such solutions will be generated after the solutions + without zeros: + + >>> list(power_representation(125, 2, 3, zeros=True)) + [(5, 6, 8), (3, 4, 10), (0, 5, 10), (0, 2, 11)] + + For even `p` the `permute_sign` function can be used to get all + signed values: + + >>> from sympy.utilities.iterables import permute_signs + >>> list(permute_signs((1, 12))) + [(1, 12), (-1, 12), (1, -12), (-1, -12)] + + All possible signed permutations can also be obtained: + + >>> from sympy.utilities.iterables import signed_permutations + >>> list(signed_permutations((1, 12))) + [(1, 12), (-1, 12), (1, -12), (-1, -12), (12, 1), (-12, 1), (12, -1), (-12, -1)] + """ + n, p, k = [as_int(i) for i in (n, p, k)] + + if n < 0: + if p % 2: + for t in power_representation(-n, p, k, zeros): + yield tuple(-i for i in t) + return + + if p < 1 or k < 1: + raise ValueError(filldedent(''' + Expecting positive integers for `(p, k)`, but got `(%s, %s)`''' + % (p, k))) + + if n == 0: + if zeros: + yield (0,)*k + return + + if k == 1: + if p == 1: + yield (n,) + elif n == 1: + yield (1,) + else: + be = perfect_power(n) + if be: + b, e = be + d, r = divmod(e, p) + if not r: + yield (b**d,) + return + + if p == 1: + yield from partition(n, k, zeros=zeros) + return + + if p == 2: + if k == 3: + n, v = remove(n, 4) + if v: + v = 1 << v + for t in power_representation(n, p, k, zeros): + yield tuple(i*v for i in t) + return + feasible = _can_do_sum_of_squares(n, k) + if not feasible: + return + if not zeros: + if n > 33 and k >= 5 and k <= n and n - k in ( + 13, 10, 7, 5, 4, 2, 1): + '''Todd G. Will, "When Is n^2 a Sum of k Squares?", [online]. + Available: https://www.maa.org/sites/default/files/Will-MMz-201037918.pdf''' + return + # quick tests since feasibility includes the possibility of 0 + if k == 4 and (n in (1, 3, 5, 9, 11, 17, 29, 41) or remove(n, 4)[0] in (2, 6, 14)): + # A000534 + return + if k == 3 and n in (1, 2, 5, 10, 13, 25, 37, 58, 85, 130): # or n = some number >= 5*10**10 + # A051952 + return + if feasible is not True: # it's prime and k == 2 + yield prime_as_sum_of_two_squares(n) + return + + if k == 2 and p > 2: + be = perfect_power(n) + if be and be[1] % p == 0: + return # Fermat: a**n + b**n = c**n has no solution for n > 2 + + if n >= k: + a = integer_nthroot(n - (k - 1), p)[0] + for t in pow_rep_recursive(a, k, n, [], p): + yield tuple(reversed(t)) + + if zeros: + a = integer_nthroot(n, p)[0] + for i in range(1, k): + for t in pow_rep_recursive(a, i, n, [], p): + yield tuple(reversed(t + (0,)*(k - i))) + + +sum_of_powers = power_representation + + +def pow_rep_recursive(n_i, k, n_remaining, terms, p): + # Invalid arguments + if n_i <= 0 or k <= 0: + return + + # No solutions may exist + if n_remaining < k: + return + if k * pow(n_i, p) < n_remaining: + return + + if k == 0 and n_remaining == 0: + yield tuple(terms) + + elif k == 1: + # next_term^p must equal to n_remaining + next_term, exact = integer_nthroot(n_remaining, p) + if exact and next_term <= n_i: + yield tuple(terms + [next_term]) + return + + else: + # TODO: Fall back to diop_DN when k = 2 + if n_i >= 1 and k > 0: + for next_term in range(1, n_i + 1): + residual = n_remaining - pow(next_term, p) + if residual < 0: + break + yield from pow_rep_recursive(next_term, k - 1, residual, terms + [next_term], p) + + +def sum_of_squares(n, k, zeros=False): + """Return a generator that yields the k-tuples of nonnegative + values, the squares of which sum to n. If zeros is False (default) + then the solution will not contain zeros. The nonnegative + elements of a tuple are sorted. + + * If k == 1 and n is square, (n,) is returned. + + * If k == 2 then n can only be written as a sum of squares if + every prime in the factorization of n that has the form + 4*k + 3 has an even multiplicity. If n is prime then + it can only be written as a sum of two squares if it is + in the form 4*k + 1. + + * if k == 3 then n can be written as a sum of squares if it does + not have the form 4**m*(8*k + 7). + + * all integers can be written as the sum of 4 squares. + + * if k > 4 then n can be partitioned and each partition can + be written as a sum of 4 squares; if n is not evenly divisible + by 4 then n can be written as a sum of squares only if the + an additional partition can be written as sum of squares. + For example, if k = 6 then n is partitioned into two parts, + the first being written as a sum of 4 squares and the second + being written as a sum of 2 squares -- which can only be + done if the condition above for k = 2 can be met, so this will + automatically reject certain partitions of n. + + Examples + ======== + + >>> from sympy.solvers.diophantine.diophantine import sum_of_squares + >>> list(sum_of_squares(25, 2)) + [(3, 4)] + >>> list(sum_of_squares(25, 2, True)) + [(3, 4), (0, 5)] + >>> list(sum_of_squares(25, 4)) + [(1, 2, 2, 4)] + + See Also + ======== + + sympy.utilities.iterables.signed_permutations + """ + yield from power_representation(n, 2, k, zeros) + + +def _can_do_sum_of_squares(n, k): + """Return True if n can be written as the sum of k squares, + False if it cannot, or 1 if ``k == 2`` and ``n`` is prime (in which + case it *can* be written as a sum of two squares). A False + is returned only if it cannot be written as ``k``-squares, even + if 0s are allowed. + """ + if k < 1: + return False + if n < 0: + return False + if n == 0: + return True + if k == 1: + return is_square(n) + if k == 2: + if n in (1, 2): + return True + if isprime(n): + if n % 4 == 1: + return 1 # signal that it was prime + return False + # n is a composite number + # we can proceed iff no prime factor in the form 4*k + 3 + # has an odd multiplicity + return all(p % 4 !=3 or m % 2 == 0 for p, m in factorint(n).items()) + if k == 3: + return remove(n, 4)[0] % 8 != 7 + # every number can be written as a sum of 4 squares; for k > 4 partitions + # can be 0 + return True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/tests/test_diophantine.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/tests/test_diophantine.py new file mode 100644 index 0000000000000000000000000000000000000000..b8b031a1e63fa445e3dbb0b425f84cfe88888667 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/diophantine/tests/test_diophantine.py @@ -0,0 +1,1071 @@ +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.core.numbers import (Rational, oo, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.matrices.dense import Matrix +from sympy.ntheory.factor_ import factorint +from sympy.simplify.powsimp import powsimp +from sympy.core.function import _mexpand +from sympy.core.sorting import default_sort_key, ordered +from sympy.functions.elementary.trigonometric import sin +from sympy.solvers.diophantine import diophantine +from sympy.solvers.diophantine.diophantine import (diop_DN, + diop_solve, diop_ternary_quadratic_normal, + diop_general_pythagorean, diop_ternary_quadratic, diop_linear, + diop_quadratic, diop_general_sum_of_squares, diop_general_sum_of_even_powers, + descent, diop_bf_DN, divisible, equivalent, find_DN, ldescent, length, + reconstruct, partition, power_representation, + prime_as_sum_of_two_squares, square_factor, sum_of_four_squares, + sum_of_three_squares, transformation_to_DN, transformation_to_normal, + classify_diop, base_solution_linear, cornacchia, sqf_normal, gaussian_reduce, holzer, + check_param, parametrize_ternary_quadratic, sum_of_powers, sum_of_squares, + _diop_ternary_quadratic_normal, _nint_or_floor, + _odd, _even, _remove_gcd, _can_do_sum_of_squares, DiophantineSolutionSet, GeneralPythagorean, + BinaryQuadratic) + +from sympy.testing.pytest import slow, raises, XFAIL +from sympy.utilities.iterables import ( + signed_permutations) + +a, b, c, d, p, q, x, y, z, w, t, u, v, X, Y, Z = symbols( + "a, b, c, d, p, q, x, y, z, w, t, u, v, X, Y, Z", integer=True) +t_0, t_1, t_2, t_3, t_4, t_5, t_6 = symbols("t_:7", integer=True) +m1, m2, m3 = symbols('m1:4', integer=True) +n1 = symbols('n1', integer=True) + + +def diop_simplify(eq): + return _mexpand(powsimp(_mexpand(eq))) + + +def test_input_format(): + raises(TypeError, lambda: diophantine(sin(x))) + raises(TypeError, lambda: diophantine(x/pi - 3)) + + +def test_nosols(): + # diophantine should sympify eq so that these are equivalent + assert diophantine(3) == set() + assert diophantine(S(3)) == set() + + +def test_univariate(): + assert diop_solve((x - 1)*(x - 2)**2) == {(1,), (2,)} + assert diop_solve((x - 1)*(x - 2)) == {(1,), (2,)} + + +def test_classify_diop(): + raises(TypeError, lambda: classify_diop(x**2/3 - 1)) + raises(ValueError, lambda: classify_diop(1)) + raises(NotImplementedError, lambda: classify_diop(w*x*y*z - 1)) + raises(NotImplementedError, lambda: classify_diop(x**3 + y**3 + z**4 - 90)) + assert classify_diop(14*x**2 + 15*x - 42) == ( + [x], {1: -42, x: 15, x**2: 14}, 'univariate') + assert classify_diop(x*y + z) == ( + [x, y, z], {x*y: 1, z: 1}, 'inhomogeneous_ternary_quadratic') + assert classify_diop(x*y + z + w + x**2) == ( + [w, x, y, z], {x*y: 1, w: 1, x**2: 1, z: 1}, 'inhomogeneous_general_quadratic') + assert classify_diop(x*y + x*z + x**2 + 1) == ( + [x, y, z], {x*y: 1, x*z: 1, x**2: 1, 1: 1}, 'inhomogeneous_general_quadratic') + assert classify_diop(x*y + z + w + 42) == ( + [w, x, y, z], {x*y: 1, w: 1, 1: 42, z: 1}, 'inhomogeneous_general_quadratic') + assert classify_diop(x*y + z*w) == ( + [w, x, y, z], {x*y: 1, w*z: 1}, 'homogeneous_general_quadratic') + assert classify_diop(x*y**2 + 1) == ( + [x, y], {x*y**2: 1, 1: 1}, 'cubic_thue') + assert classify_diop(x**4 + y**4 + z**4 - (1 + 16 + 81)) == ( + [x, y, z], {1: -98, x**4: 1, z**4: 1, y**4: 1}, 'general_sum_of_even_powers') + assert classify_diop(x**2 + y**2 + z**2) == ( + [x, y, z], {x**2: 1, y**2: 1, z**2: 1}, 'homogeneous_ternary_quadratic_normal') + + +def test_linear(): + assert diop_solve(x) == (0,) + assert diop_solve(1*x) == (0,) + assert diop_solve(3*x) == (0,) + assert diop_solve(x + 1) == (-1,) + assert diop_solve(2*x + 1) == (None,) + assert diop_solve(2*x + 4) == (-2,) + assert diop_solve(y + x) == (t_0, -t_0) + assert diop_solve(y + x + 0) == (t_0, -t_0) + assert diop_solve(y + x - 0) == (t_0, -t_0) + assert diop_solve(0*x - y - 5) == (-5,) + assert diop_solve(3*y + 2*x - 5) == (3*t_0 - 5, -2*t_0 + 5) + assert diop_solve(2*x - 3*y - 5) == (3*t_0 - 5, 2*t_0 - 5) + assert diop_solve(-2*x - 3*y - 5) == (3*t_0 + 5, -2*t_0 - 5) + assert diop_solve(7*x + 5*y) == (5*t_0, -7*t_0) + assert diop_solve(2*x + 4*y) == (-2*t_0, t_0) + assert diop_solve(4*x + 6*y - 4) == (3*t_0 - 2, -2*t_0 + 2) + assert diop_solve(4*x + 6*y - 3) == (None, None) + assert diop_solve(0*x + 3*y - 4*z + 5) == (4*t_0 + 5, 3*t_0 + 5) + assert diop_solve(4*x + 3*y - 4*z + 5) == (t_0, 8*t_0 + 4*t_1 + 5, 7*t_0 + 3*t_1 + 5) + assert diop_solve(4*x + 3*y - 4*z + 5, None) == (0, 5, 5) + assert diop_solve(4*x + 2*y + 8*z - 5) == (None, None, None) + assert diop_solve(5*x + 7*y - 2*z - 6) == (t_0, -3*t_0 + 2*t_1 + 6, -8*t_0 + 7*t_1 + 18) + assert diop_solve(3*x - 6*y + 12*z - 9) == (2*t_0 + 3, t_0 + 2*t_1, t_1) + assert diop_solve(6*w + 9*x + 20*y - z) == (t_0, t_1, t_1 + t_2, 6*t_0 + 29*t_1 + 20*t_2) + + # to ignore constant factors, use diophantine + raises(TypeError, lambda: diop_solve(x/2)) + + +def test_quadratic_simple_hyperbolic_case(): + # Simple Hyperbolic case: A = C = 0 and B != 0 + assert diop_solve(3*x*y + 34*x - 12*y + 1) == \ + {(-133, -11), (5, -57)} + assert diop_solve(6*x*y + 2*x + 3*y + 1) == set() + assert diop_solve(-13*x*y + 2*x - 4*y - 54) == {(27, 0)} + assert diop_solve(-27*x*y - 30*x - 12*y - 54) == {(-14, -1)} + assert diop_solve(2*x*y + 5*x + 56*y + 7) == {(-161, -3), (-47, -6), (-35, -12), + (-29, -69), (-27, 64), (-21, 7), + (-9, 1), (105, -2)} + assert diop_solve(6*x*y + 9*x + 2*y + 3) == set() + assert diop_solve(x*y + x + y + 1) == {(-1, t), (t, -1)} + assert diophantine(48*x*y) + + +def test_quadratic_elliptical_case(): + # Elliptical case: B**2 - 4AC < 0 + + assert diop_solve(42*x**2 + 8*x*y + 15*y**2 + 23*x + 17*y - 4915) == {(-11, -1)} + assert diop_solve(4*x**2 + 3*y**2 + 5*x - 11*y + 12) == set() + assert diop_solve(x**2 + y**2 + 2*x + 2*y + 2) == {(-1, -1)} + assert diop_solve(15*x**2 - 9*x*y + 14*y**2 - 23*x - 14*y - 4950) == {(-15, 6)} + assert diop_solve(10*x**2 + 12*x*y + 12*y**2 - 34) == \ + {(-1, -1), (-1, 2), (1, -2), (1, 1)} + + +def test_quadratic_parabolic_case(): + # Parabolic case: B**2 - 4AC = 0 + assert check_solutions(8*x**2 - 24*x*y + 18*y**2 + 5*x + 7*y + 16) + assert check_solutions(8*x**2 - 24*x*y + 18*y**2 + 6*x + 12*y - 6) + assert check_solutions(8*x**2 + 24*x*y + 18*y**2 + 4*x + 6*y - 7) + assert check_solutions(-4*x**2 + 4*x*y - y**2 + 2*x - 3) + assert check_solutions(x**2 + 2*x*y + y**2 + 2*x + 2*y + 1) + assert check_solutions(x**2 - 2*x*y + y**2 + 2*x + 2*y + 1) + assert check_solutions(y**2 - 41*x + 40) + + +def test_quadratic_perfect_square(): + # B**2 - 4*A*C > 0 + # B**2 - 4*A*C is a perfect square + assert check_solutions(48*x*y) + assert check_solutions(4*x**2 - 5*x*y + y**2 + 2) + assert check_solutions(-2*x**2 - 3*x*y + 2*y**2 -2*x - 17*y + 25) + assert check_solutions(12*x**2 + 13*x*y + 3*y**2 - 2*x + 3*y - 12) + assert check_solutions(8*x**2 + 10*x*y + 2*y**2 - 32*x - 13*y - 23) + assert check_solutions(4*x**2 - 4*x*y - 3*y- 8*x - 3) + assert check_solutions(- 4*x*y - 4*y**2 - 3*y- 5*x - 10) + assert check_solutions(x**2 - y**2 - 2*x - 2*y) + assert check_solutions(x**2 - 9*y**2 - 2*x - 6*y) + assert check_solutions(4*x**2 - 9*y**2 - 4*x - 12*y - 3) + + +def test_quadratic_non_perfect_square(): + # B**2 - 4*A*C is not a perfect square + # Used check_solutions() since the solutions are complex expressions involving + # square roots and exponents + assert check_solutions(x**2 - 2*x - 5*y**2) + assert check_solutions(3*x**2 - 2*y**2 - 2*x - 2*y) + assert check_solutions(x**2 - x*y - y**2 - 3*y) + assert check_solutions(x**2 - 9*y**2 - 2*x - 6*y) + assert BinaryQuadratic(x**2 + y**2 + 2*x + 2*y + 2).solve() == {(-1, -1)} + + +def test_issue_9106(): + eq = -48 - 2*x*(3*x - 1) + y*(3*y - 1) + v = (x, y) + for sol in diophantine(eq): + assert not diop_simplify(eq.xreplace(dict(zip(v, sol)))) + + +def test_issue_18138(): + eq = x**2 - x - y**2 + v = (x, y) + for sol in diophantine(eq): + assert not diop_simplify(eq.xreplace(dict(zip(v, sol)))) + + +@slow +def test_quadratic_non_perfect_slow(): + assert check_solutions(8*x**2 + 10*x*y - 2*y**2 - 32*x - 13*y - 23) + # This leads to very large numbers. + # assert check_solutions(5*x**2 - 13*x*y + y**2 - 4*x - 4*y - 15) + assert check_solutions(-3*x**2 - 2*x*y + 7*y**2 - 5*x - 7) + assert check_solutions(-4 - x + 4*x**2 - y - 3*x*y - 4*y**2) + assert check_solutions(1 + 2*x + 2*x**2 + 2*y + x*y - 2*y**2) + + +def test_DN(): + # Most of the test cases were adapted from, + # Solving the generalized Pell equation x**2 - D*y**2 = N, John P. Robertson, July 31, 2004. + # https://web.archive.org/web/20160323033128/http://www.jpr2718.org/pell.pdf + # others are verified using Wolfram Alpha. + + # Covers cases where D <= 0 or D > 0 and D is a square or N = 0 + # Solutions are straightforward in these cases. + assert diop_DN(3, 0) == [(0, 0)] + assert diop_DN(-17, -5) == [] + assert diop_DN(-19, 23) == [(2, 1)] + assert diop_DN(-13, 17) == [(2, 1)] + assert diop_DN(-15, 13) == [] + assert diop_DN(0, 5) == [] + assert diop_DN(0, 9) == [(3, t)] + assert diop_DN(9, 0) == [(3*t, t)] + assert diop_DN(16, 24) == [] + assert diop_DN(9, 180) == [(18, 4)] + assert diop_DN(9, -180) == [(12, 6)] + assert diop_DN(7, 0) == [(0, 0)] + + # When equation is x**2 + y**2 = N + # Solutions are interchangeable + assert diop_DN(-1, 5) == [(2, 1), (1, 2)] + assert diop_DN(-1, 169) == [(12, 5), (5, 12), (13, 0), (0, 13)] + + # D > 0 and D is not a square + + # N = 1 + assert diop_DN(13, 1) == [(649, 180)] + assert diop_DN(980, 1) == [(51841, 1656)] + assert diop_DN(981, 1) == [(158070671986249, 5046808151700)] + assert diop_DN(986, 1) == [(49299, 1570)] + assert diop_DN(991, 1) == [(379516400906811930638014896080, 12055735790331359447442538767)] + assert diop_DN(17, 1) == [(33, 8)] + assert diop_DN(19, 1) == [(170, 39)] + + # N = -1 + assert diop_DN(13, -1) == [(18, 5)] + assert diop_DN(991, -1) == [] + assert diop_DN(41, -1) == [(32, 5)] + assert diop_DN(290, -1) == [(17, 1)] + assert diop_DN(21257, -1) == [(13913102721304, 95427381109)] + assert diop_DN(32, -1) == [] + + # |N| > 1 + # Some tests were created using calculator at + # http://www.numbertheory.org/php/patz.html + + assert diop_DN(13, -4) == [(3, 1), (393, 109), (36, 10)] + # Source I referred returned (3, 1), (393, 109) and (-3, 1) as fundamental solutions + # So (-3, 1) and (393, 109) should be in the same equivalent class + assert equivalent(-3, 1, 393, 109, 13, -4) == True + + assert diop_DN(13, 27) == [(220, 61), (40, 11), (768, 213), (12, 3)] + assert set(diop_DN(157, 12)) == {(13, 1), (10663, 851), (579160, 46222), + (483790960, 38610722), (26277068347, 2097138361), + (21950079635497, 1751807067011)} + assert diop_DN(13, 25) == [(3245, 900)] + assert diop_DN(192, 18) == [] + assert diop_DN(23, 13) == [(-6, 1), (6, 1)] + assert diop_DN(167, 2) == [(13, 1)] + assert diop_DN(167, -2) == [] + + assert diop_DN(123, -2) == [(11, 1)] + # One calculator returned [(11, 1), (-11, 1)] but both of these are in + # the same equivalence class + assert equivalent(11, 1, -11, 1, 123, -2) + + assert diop_DN(123, -23) == [(-10, 1), (10, 1)] + + assert diop_DN(0, 0, t) == [(0, t)] + assert diop_DN(0, -1, t) == [] + + +def test_bf_pell(): + assert diop_bf_DN(13, -4) == [(3, 1), (-3, 1), (36, 10)] + assert diop_bf_DN(13, 27) == [(12, 3), (-12, 3), (40, 11), (-40, 11)] + assert diop_bf_DN(167, -2) == [] + assert diop_bf_DN(1729, 1) == [(44611924489705, 1072885712316)] + assert diop_bf_DN(89, -8) == [(9, 1), (-9, 1)] + assert diop_bf_DN(21257, -1) == [(13913102721304, 95427381109)] + assert diop_bf_DN(340, -4) == [(756, 41)] + assert diop_bf_DN(-1, 0, t) == [(0, 0)] + assert diop_bf_DN(0, 0, t) == [(0, t)] + assert diop_bf_DN(4, 0, t) == [(2*t, t), (-2*t, t)] + assert diop_bf_DN(3, 0, t) == [(0, 0)] + assert diop_bf_DN(1, -2, t) == [] + + +def test_length(): + assert length(2, 1, 0) == 1 + assert length(-2, 4, 5) == 3 + assert length(-5, 4, 17) == 4 + assert length(0, 4, 13) == 6 + assert length(7, 13, 11) == 23 + assert length(1, 6, 4) == 2 + + +def is_pell_transformation_ok(eq): + """ + Test whether X*Y, X, or Y terms are present in the equation + after transforming the equation using the transformation returned + by transformation_to_pell(). If they are not present we are good. + Moreover, coefficient of X**2 should be a divisor of coefficient of + Y**2 and the constant term. + """ + A, B = transformation_to_DN(eq) + u = (A*Matrix([X, Y]) + B)[0] + v = (A*Matrix([X, Y]) + B)[1] + simplified = diop_simplify(eq.subs(zip((x, y), (u, v)))) + + coeff = dict([reversed(t.as_independent(*[X, Y])) for t in simplified.args]) + + for term in [X*Y, X, Y]: + if term in coeff.keys(): + return False + + for term in [X**2, Y**2, 1]: + if term not in coeff.keys(): + coeff[term] = 0 + + if coeff[X**2] != 0: + return divisible(coeff[Y**2], coeff[X**2]) and \ + divisible(coeff[1], coeff[X**2]) + + return True + + +def test_transformation_to_pell(): + assert is_pell_transformation_ok(-13*x**2 - 7*x*y + y**2 + 2*x - 2*y - 14) + assert is_pell_transformation_ok(-17*x**2 + 19*x*y - 7*y**2 - 5*x - 13*y - 23) + assert is_pell_transformation_ok(x**2 - y**2 + 17) + assert is_pell_transformation_ok(-x**2 + 7*y**2 - 23) + assert is_pell_transformation_ok(25*x**2 - 45*x*y + 5*y**2 - 5*x - 10*y + 5) + assert is_pell_transformation_ok(190*x**2 + 30*x*y + y**2 - 3*y - 170*x - 130) + assert is_pell_transformation_ok(x**2 - 2*x*y -190*y**2 - 7*y - 23*x - 89) + assert is_pell_transformation_ok(15*x**2 - 9*x*y + 14*y**2 - 23*x - 14*y - 4950) + + +def test_find_DN(): + assert find_DN(x**2 - 2*x - y**2) == (1, 1) + assert find_DN(x**2 - 3*y**2 - 5) == (3, 5) + assert find_DN(x**2 - 2*x*y - 4*y**2 - 7) == (5, 7) + assert find_DN(4*x**2 - 8*x*y - y**2 - 9) == (20, 36) + assert find_DN(7*x**2 - 2*x*y - y**2 - 12) == (8, 84) + assert find_DN(-3*x**2 + 4*x*y -y**2) == (1, 0) + assert find_DN(-13*x**2 - 7*x*y + y**2 + 2*x - 2*y -14) == (101, -7825480) + + +def test_ldescent(): + # Equations which have solutions + u = ([(13, 23), (3, -11), (41, -113), (4, -7), (-7, 4), (91, -3), (1, 1), (1, -1), + (4, 32), (17, 13), (123689, 1), (19, -570)]) + for a, b in u: + w, x, y = ldescent(a, b) + assert a*x**2 + b*y**2 == w**2 + assert ldescent(-1, -1) is None + assert ldescent(2, 6) is None + + +def test_diop_ternary_quadratic_normal(): + assert check_solutions(234*x**2 - 65601*y**2 - z**2) + assert check_solutions(23*x**2 + 616*y**2 - z**2) + assert check_solutions(5*x**2 + 4*y**2 - z**2) + assert check_solutions(3*x**2 + 6*y**2 - 3*z**2) + assert check_solutions(x**2 + 3*y**2 - z**2) + assert check_solutions(4*x**2 + 5*y**2 - z**2) + assert check_solutions(x**2 + y**2 - z**2) + assert check_solutions(16*x**2 + y**2 - 25*z**2) + assert check_solutions(6*x**2 - y**2 + 10*z**2) + assert check_solutions(213*x**2 + 12*y**2 - 9*z**2) + assert check_solutions(34*x**2 - 3*y**2 - 301*z**2) + assert check_solutions(124*x**2 - 30*y**2 - 7729*z**2) + + +def is_normal_transformation_ok(eq): + A = transformation_to_normal(eq) + X, Y, Z = A*Matrix([x, y, z]) + simplified = diop_simplify(eq.subs(zip((x, y, z), (X, Y, Z)))) + + coeff = dict([reversed(t.as_independent(*[X, Y, Z])) for t in simplified.args]) + for term in [X*Y, Y*Z, X*Z]: + if term in coeff.keys(): + return False + + return True + + +def test_transformation_to_normal(): + assert is_normal_transformation_ok(x**2 + 3*y**2 + z**2 - 13*x*y - 16*y*z + 12*x*z) + assert is_normal_transformation_ok(x**2 + 3*y**2 - 100*z**2) + assert is_normal_transformation_ok(x**2 + 23*y*z) + assert is_normal_transformation_ok(3*y**2 - 100*z**2 - 12*x*y) + assert is_normal_transformation_ok(x**2 + 23*x*y - 34*y*z + 12*x*z) + assert is_normal_transformation_ok(z**2 + 34*x*y - 23*y*z + x*z) + assert is_normal_transformation_ok(x**2 + y**2 + z**2 - x*y - y*z - x*z) + assert is_normal_transformation_ok(x**2 + 2*y*z + 3*z**2) + assert is_normal_transformation_ok(x*y + 2*x*z + 3*y*z) + assert is_normal_transformation_ok(2*x*z + 3*y*z) + + +def test_diop_ternary_quadratic(): + assert check_solutions(2*x**2 + z**2 + y**2 - 4*x*y) + assert check_solutions(x**2 - y**2 - z**2 - x*y - y*z) + assert check_solutions(3*x**2 - x*y - y*z - x*z) + assert check_solutions(x**2 - y*z - x*z) + assert check_solutions(5*x**2 - 3*x*y - x*z) + assert check_solutions(4*x**2 - 5*y**2 - x*z) + assert check_solutions(3*x**2 + 2*y**2 - z**2 - 2*x*y + 5*y*z - 7*y*z) + assert check_solutions(8*x**2 - 12*y*z) + assert check_solutions(45*x**2 - 7*y**2 - 8*x*y - z**2) + assert check_solutions(x**2 - 49*y**2 - z**2 + 13*z*y -8*x*y) + assert check_solutions(90*x**2 + 3*y**2 + 5*x*y + 2*z*y + 5*x*z) + assert check_solutions(x**2 + 3*y**2 + z**2 - x*y - 17*y*z) + assert check_solutions(x**2 + 3*y**2 + z**2 - x*y - 16*y*z + 12*x*z) + assert check_solutions(x**2 + 3*y**2 + z**2 - 13*x*y - 16*y*z + 12*x*z) + assert check_solutions(x*y - 7*y*z + 13*x*z) + + assert diop_ternary_quadratic_normal(x**2 + y**2 + z**2) == (None, None, None) + assert diop_ternary_quadratic_normal(x**2 + y**2) is None + raises(ValueError, lambda: + _diop_ternary_quadratic_normal((x, y, z), + {x*y: 1, x**2: 2, y**2: 3, z**2: 0})) + eq = -2*x*y - 6*x*z + 7*y**2 - 3*y*z + 4*z**2 + assert diop_ternary_quadratic(eq) == (7, 2, 0) + assert diop_ternary_quadratic_normal(4*x**2 + 5*y**2 - z**2) == \ + (1, 0, 2) + assert diop_ternary_quadratic(x*y + 2*y*z) == \ + (-2, 0, n1) + eq = -5*x*y - 8*x*z - 3*y*z + 8*z**2 + assert parametrize_ternary_quadratic(eq) == \ + (8*p**2 - 3*p*q, -8*p*q + 8*q**2, 5*p*q) + # this cannot be tested with diophantine because it will + # factor into a product + assert diop_solve(x*y + 2*y*z) == (-2*p*q, -n1*p**2 + p**2, p*q) + + +def test_square_factor(): + assert square_factor(1) == square_factor(-1) == 1 + assert square_factor(0) == 1 + assert square_factor(5) == square_factor(-5) == 1 + assert square_factor(4) == square_factor(-4) == 2 + assert square_factor(12) == square_factor(-12) == 2 + assert square_factor(6) == 1 + assert square_factor(18) == 3 + assert square_factor(52) == 2 + assert square_factor(49) == 7 + assert square_factor(392) == 14 + assert square_factor(factorint(-12)) == 2 + + +def test_parametrize_ternary_quadratic(): + assert check_solutions(x**2 + y**2 - z**2) + assert check_solutions(x**2 + 2*x*y + z**2) + assert check_solutions(234*x**2 - 65601*y**2 - z**2) + assert check_solutions(3*x**2 + 2*y**2 - z**2 - 2*x*y + 5*y*z - 7*y*z) + assert check_solutions(x**2 - y**2 - z**2) + assert check_solutions(x**2 - 49*y**2 - z**2 + 13*z*y - 8*x*y) + assert check_solutions(8*x*y + z**2) + assert check_solutions(124*x**2 - 30*y**2 - 7729*z**2) + assert check_solutions(236*x**2 - 225*y**2 - 11*x*y - 13*y*z - 17*x*z) + assert check_solutions(90*x**2 + 3*y**2 + 5*x*y + 2*z*y + 5*x*z) + assert check_solutions(124*x**2 - 30*y**2 - 7729*z**2) + + +def test_no_square_ternary_quadratic(): + assert check_solutions(2*x*y + y*z - 3*x*z) + assert check_solutions(189*x*y - 345*y*z - 12*x*z) + assert check_solutions(23*x*y + 34*y*z) + assert check_solutions(x*y + y*z + z*x) + assert check_solutions(23*x*y + 23*y*z + 23*x*z) + + +def test_descent(): + + u = ([(13, 23), (3, -11), (41, -113), (91, -3), (1, 1), (1, -1), (17, 13), (123689, 1), (19, -570)]) + for a, b in u: + w, x, y = descent(a, b) + assert a*x**2 + b*y**2 == w**2 + # the docstring warns against bad input, so these are expected results + # - can't both be negative + raises(TypeError, lambda: descent(-1, -3)) + # A can't be zero unless B != 1 + raises(ZeroDivisionError, lambda: descent(0, 3)) + # supposed to be square-free + raises(TypeError, lambda: descent(4, 3)) + + +def test_diophantine(): + assert check_solutions((x - y)*(y - z)*(z - x)) + assert check_solutions((x - y)*(x**2 + y**2 - z**2)) + assert check_solutions((x - 3*y + 7*z)*(x**2 + y**2 - z**2)) + assert check_solutions(x**2 - 3*y**2 - 1) + assert check_solutions(y**2 + 7*x*y) + assert check_solutions(x**2 - 3*x*y + y**2) + assert check_solutions(z*(x**2 - y**2 - 15)) + assert check_solutions(x*(2*y - 2*z + 5)) + assert check_solutions((x**2 - 3*y**2 - 1)*(x**2 - y**2 - 15)) + assert check_solutions((x**2 - 3*y**2 - 1)*(y - 7*z)) + assert check_solutions((x**2 + y**2 - z**2)*(x - 7*y - 3*z + 4*w)) + # Following test case caused problems in parametric representation + # But this can be solved by factoring out y. + # No need to use methods for ternary quadratic equations. + assert check_solutions(y**2 - 7*x*y + 4*y*z) + assert check_solutions(x**2 - 2*x + 1) + + assert diophantine(x - y) == diophantine(Eq(x, y)) + # 18196 + eq = x**4 + y**4 - 97 + assert diophantine(eq, permute=True) == diophantine(-eq, permute=True) + assert diophantine(3*x*pi - 2*y*pi) == {(2*t_0, 3*t_0)} + eq = x**2 + y**2 + z**2 - 14 + base_sol = {(1, 2, 3)} + assert diophantine(eq) == base_sol + complete_soln = set(signed_permutations(base_sol.pop())) + assert diophantine(eq, permute=True) == complete_soln + + assert diophantine(x**2 + x*Rational(15, 14) - 3) == set() + # test issue 11049 + eq = 92*x**2 - 99*y**2 - z**2 + coeff = eq.as_coefficients_dict() + assert _diop_ternary_quadratic_normal((x, y, z), coeff) == \ + {(9, 7, 51)} + assert diophantine(eq) == {( + 891*p**2 + 9*q**2, -693*p**2 - 102*p*q + 7*q**2, + 5049*p**2 - 1386*p*q - 51*q**2)} + eq = 2*x**2 + 2*y**2 - z**2 + coeff = eq.as_coefficients_dict() + assert _diop_ternary_quadratic_normal((x, y, z), coeff) == \ + {(1, 1, 2)} + assert diophantine(eq) == {( + 2*p**2 - q**2, -2*p**2 + 4*p*q - q**2, + 4*p**2 - 4*p*q + 2*q**2)} + eq = 411*x**2+57*y**2-221*z**2 + coeff = eq.as_coefficients_dict() + assert _diop_ternary_quadratic_normal((x, y, z), coeff) == \ + {(2021, 2645, 3066)} + assert diophantine(eq) == \ + {(115197*p**2 - 446641*q**2, -150765*p**2 + 1355172*p*q - + 584545*q**2, 174762*p**2 - 301530*p*q + 677586*q**2)} + eq = 573*x**2+267*y**2-984*z**2 + coeff = eq.as_coefficients_dict() + assert _diop_ternary_quadratic_normal((x, y, z), coeff) == \ + {(49, 233, 127)} + assert diophantine(eq) == \ + {(4361*p**2 - 16072*q**2, -20737*p**2 + 83312*p*q - 76424*q**2, + 11303*p**2 - 41474*p*q + 41656*q**2)} + # this produces factors during reconstruction + eq = x**2 + 3*y**2 - 12*z**2 + coeff = eq.as_coefficients_dict() + assert _diop_ternary_quadratic_normal((x, y, z), coeff) == \ + {(0, 2, 1)} + assert diophantine(eq) == \ + {(24*p*q, 2*p**2 - 24*q**2, p**2 + 12*q**2)} + # solvers have not been written for every type + raises(NotImplementedError, lambda: diophantine(x*y**2 + 1)) + + # rational expressions + assert diophantine(1/x) == set() + assert diophantine(1/x + 1/y - S.Half) == {(6, 3), (-2, 1), (4, 4), (1, -2), (3, 6)} + assert diophantine(x**2 + y**2 +3*x- 5, permute=True) == \ + {(-1, 1), (-4, -1), (1, -1), (1, 1), (-4, 1), (-1, -1), (4, 1), (4, -1)} + + + #test issue 18186 + assert diophantine(y**4 + x**4 - 2**4 - 3**4, syms=(x, y), permute=True) == \ + {(-3, -2), (-3, 2), (-2, -3), (-2, 3), (2, -3), (2, 3), (3, -2), (3, 2)} + assert diophantine(y**4 + x**4 - 2**4 - 3**4, syms=(y, x), permute=True) == \ + {(-3, -2), (-3, 2), (-2, -3), (-2, 3), (2, -3), (2, 3), (3, -2), (3, 2)} + + # issue 18122 + assert check_solutions(x**2 - y) + assert check_solutions(y**2 - x) + assert diophantine((x**2 - y), t) == {(t, t**2)} + assert diophantine((y**2 - x), t) == {(t**2, t)} + + +def test_general_pythagorean(): + from sympy.abc import a, b, c, d, e + + assert check_solutions(a**2 + b**2 + c**2 - d**2) + assert check_solutions(a**2 + 4*b**2 + 4*c**2 - d**2) + assert check_solutions(9*a**2 + 4*b**2 + 4*c**2 - d**2) + assert check_solutions(9*a**2 + 4*b**2 - 25*d**2 + 4*c**2 ) + assert check_solutions(9*a**2 - 16*d**2 + 4*b**2 + 4*c**2) + assert check_solutions(-e**2 + 9*a**2 + 4*b**2 + 4*c**2 + 25*d**2) + assert check_solutions(16*a**2 - b**2 + 9*c**2 + d**2 + 25*e**2) + + assert GeneralPythagorean(a**2 + b**2 + c**2 - d**2).solve(parameters=[x, y, z]) == \ + {(x**2 + y**2 - z**2, 2*x*z, 2*y*z, x**2 + y**2 + z**2)} + + +def test_diop_general_sum_of_squares_quick(): + for i in range(3, 10): + assert check_solutions(sum(i**2 for i in symbols(':%i' % i)) - i) + + assert diop_general_sum_of_squares(x**2 + y**2 - 2) is None + assert diop_general_sum_of_squares(x**2 + y**2 + z**2 + 2) == set() + eq = x**2 + y**2 + z**2 - (1 + 4 + 9) + assert diop_general_sum_of_squares(eq) == \ + {(1, 2, 3)} + eq = u**2 + v**2 + x**2 + y**2 + z**2 - 1313 + assert len(diop_general_sum_of_squares(eq, 3)) == 3 + # issue 11016 + var = symbols(':5') + (symbols('6', negative=True),) + eq = Add(*[i**2 for i in var]) - 112 + + base_soln = {(0, 1, 1, 5, 6, -7), (1, 1, 1, 3, 6, -8), (2, 3, 3, 4, 5, -7), (0, 1, 1, 1, 3, -10), + (0, 0, 4, 4, 4, -8), (1, 2, 3, 3, 5, -8), (0, 1, 2, 3, 7, -7), (2, 2, 4, 4, 6, -6), + (1, 1, 3, 4, 6, -7), (0, 2, 3, 3, 3, -9), (0, 0, 2, 2, 2, -10), (1, 1, 2, 3, 4, -9), + (0, 1, 1, 2, 5, -9), (0, 0, 2, 6, 6, -6), (1, 3, 4, 5, 5, -6), (0, 2, 2, 2, 6, -8), + (0, 3, 3, 3, 6, -7), (0, 2, 3, 5, 5, -7), (0, 1, 5, 5, 5, -6)} + assert diophantine(eq) == base_soln + assert len(diophantine(eq, permute=True)) == 196800 + + # handle negated squares with signsimp + assert diophantine(12 - x**2 - y**2 - z**2) == {(2, 2, 2)} + # diophantine handles simplification, so classify_diop should + # not have to look for additional patterns that are removed + # by diophantine + eq = a**2 + b**2 + c**2 + d**2 - 4 + raises(NotImplementedError, lambda: classify_diop(-eq)) + + +def test_issue_23807(): + # fixes recursion error + eq = x**2 + y**2 + z**2 - 1000000 + base_soln = {(0, 0, 1000), (0, 352, 936), (480, 600, 640), (24, 640, 768), (192, 640, 744), + (192, 480, 856), (168, 224, 960), (0, 600, 800), (280, 576, 768), (152, 480, 864), + (0, 280, 960), (352, 360, 864), (424, 480, 768), (360, 480, 800), (224, 600, 768), + (96, 360, 928), (168, 576, 800), (96, 480, 872)} + + assert diophantine(eq) == base_soln + + +def test_diop_partition(): + for n in [8, 10]: + for k in range(1, 8): + for p in partition(n, k): + assert len(p) == k + assert list(partition(3, 5)) == [] + assert [list(p) for p in partition(3, 5, 1)] == [ + [0, 0, 0, 0, 3], [0, 0, 0, 1, 2], [0, 0, 1, 1, 1]] + assert list(partition(0)) == [()] + assert list(partition(1, 0)) == [()] + assert [list(i) for i in partition(3)] == [[1, 1, 1], [1, 2], [3]] + + +def test_prime_as_sum_of_two_squares(): + for i in [5, 13, 17, 29, 37, 41, 2341, 3557, 34841, 64601]: + a, b = prime_as_sum_of_two_squares(i) + assert a**2 + b**2 == i + assert prime_as_sum_of_two_squares(7) is None + ans = prime_as_sum_of_two_squares(800029) + assert ans == (450, 773) and type(ans[0]) is int + + +def test_sum_of_three_squares(): + for i in [0, 1, 2, 34, 123, 34304595905, 34304595905394941, 343045959052344, + 800, 801, 802, 803, 804, 805, 806]: + a, b, c = sum_of_three_squares(i) + assert a**2 + b**2 + c**2 == i + assert a >= 0 + + # error + raises(ValueError, lambda: sum_of_three_squares(-1)) + + assert sum_of_three_squares(7) is None + assert sum_of_three_squares((4**5)*15) is None + # if there are two zeros, there might be a solution + # with only one zero, e.g. 25 => (0, 3, 4) or + # with no zeros, e.g. 49 => (2, 3, 6) + assert sum_of_three_squares(25) == (0, 0, 5) + assert sum_of_three_squares(4) == (0, 0, 2) + + +def test_sum_of_four_squares(): + from sympy.core.random import randint + + # this should never fail + n = randint(1, 100000000000000) + assert sum(i**2 for i in sum_of_four_squares(n)) == n + + # error + raises(ValueError, lambda: sum_of_four_squares(-1)) + + for n in range(1000): + result = sum_of_four_squares(n) + assert len(result) == 4 + assert all(r >= 0 for r in result) + assert sum(r**2 for r in result) == n + assert list(result) == sorted(result) + + +def test_power_representation(): + tests = [(1729, 3, 2), (234, 2, 4), (2, 1, 2), (3, 1, 3), (5, 2, 2), (12352, 2, 4), + (32760, 2, 3)] + + for test in tests: + n, p, k = test + f = power_representation(n, p, k) + + while True: + try: + l = next(f) + assert len(l) == k + + chk_sum = 0 + for l_i in l: + chk_sum = chk_sum + l_i**p + assert chk_sum == n + + except StopIteration: + break + + assert list(power_representation(20, 2, 4, True)) == \ + [(1, 1, 3, 3), (0, 0, 2, 4)] + raises(ValueError, lambda: list(power_representation(1.2, 2, 2))) + raises(ValueError, lambda: list(power_representation(2, 0, 2))) + raises(ValueError, lambda: list(power_representation(2, 2, 0))) + assert list(power_representation(-1, 2, 2)) == [] + assert list(power_representation(1, 1, 1)) == [(1,)] + assert list(power_representation(3, 2, 1)) == [] + assert list(power_representation(4, 2, 1)) == [(2,)] + assert list(power_representation(3**4, 4, 6, zeros=True)) == \ + [(1, 2, 2, 2, 2, 2), (0, 0, 0, 0, 0, 3)] + assert list(power_representation(3**4, 4, 5, zeros=False)) == [] + assert list(power_representation(-2, 3, 2)) == [(-1, -1)] + assert list(power_representation(-2, 4, 2)) == [] + assert list(power_representation(0, 3, 2, True)) == [(0, 0)] + assert list(power_representation(0, 3, 2, False)) == [] + # when we are dealing with squares, do feasibility checks + assert len(list(power_representation(4**10*(8*10 + 7), 2, 3))) == 0 + # there will be a recursion error if these aren't recognized + big = 2**30 + for i in [13, 10, 7, 5, 4, 2, 1]: + assert list(sum_of_powers(big, 2, big - i)) == [] + + +def test_assumptions(): + """ + Test whether diophantine respects the assumptions. + """ + #Test case taken from the below so question regarding assumptions in diophantine module + #https://stackoverflow.com/questions/23301941/how-can-i-declare-natural-symbols-with-sympy + m, n = symbols('m n', integer=True, positive=True) + diof = diophantine(n**2 + m*n - 500) + assert diof == {(5, 20), (40, 10), (95, 5), (121, 4), (248, 2), (499, 1)} + + a, b = symbols('a b', integer=True, positive=False) + diof = diophantine(a*b + 2*a + 3*b - 6) + assert diof == {(-15, -3), (-9, -4), (-7, -5), (-6, -6), (-5, -8), (-4, -14)} + + x, y = symbols('x y', integer=True) + diof = diophantine(10*x**2 + 5*x*y - 3*y) + assert diof == {(1, -5), (-3, 5), (0, 0)} + + x, y = symbols('x y', integer=True, positive=True) + diof = diophantine(10*x**2 + 5*x*y - 3*y) + assert diof == set() + + x, y = symbols('x y', integer=True, negative=False) + diof = diophantine(10*x**2 + 5*x*y - 3*y) + assert diof == {(0, 0)} + + +def check_solutions(eq): + """ + Determines whether solutions returned by diophantine() satisfy the original + equation. Hope to generalize this so we can remove functions like check_ternay_quadratic, + check_solutions_normal, check_solutions() + """ + s = diophantine(eq) + + factors = Mul.make_args(eq) + + var = list(eq.free_symbols) + var.sort(key=default_sort_key) + + while s: + solution = s.pop() + for f in factors: + if diop_simplify(f.subs(zip(var, solution))) == 0: + break + else: + return False + return True + + +def test_diopcoverage(): + eq = (2*x + y + 1)**2 + assert diop_solve(eq) == {(t_0, -2*t_0 - 1)} + eq = 2*x**2 + 6*x*y + 12*x + 4*y**2 + 18*y + 18 + assert diop_solve(eq) == {(t, -t - 3), (-2*t - 3, t)} + assert diop_quadratic(x + y**2 - 3) == {(-t**2 + 3, t)} + + assert diop_linear(x + y - 3) == (t_0, 3 - t_0) + + assert base_solution_linear(0, 1, 2, t=None) == (0, 0) + ans = (3*t - 1, -2*t + 1) + assert base_solution_linear(4, 8, 12, t) == ans + assert base_solution_linear(4, 8, 12, t=None) == tuple(_.subs(t, 0) for _ in ans) + + assert cornacchia(1, 1, 20) == set() + assert cornacchia(1, 1, 5) == {(2, 1)} + assert cornacchia(1, 2, 17) == {(3, 2)} + + raises(ValueError, lambda: reconstruct(4, 20, 1)) + + assert gaussian_reduce(4, 1, 3) == (1, 1) + eq = -w**2 - x**2 - y**2 + z**2 + + assert diop_general_pythagorean(eq) == \ + diop_general_pythagorean(-eq) == \ + (m1**2 + m2**2 - m3**2, 2*m1*m3, + 2*m2*m3, m1**2 + m2**2 + m3**2) + + assert len(check_param(S(3) + x/3, S(4) + x/2, S(2), [x])) == 0 + assert len(check_param(Rational(3, 2), S(4) + x, S(2), [x])) == 0 + assert len(check_param(S(4) + x, Rational(3, 2), S(2), [x])) == 0 + + assert _nint_or_floor(16, 10) == 2 + assert _odd(1) == (not _even(1)) == True + assert _odd(0) == (not _even(0)) == False + assert _remove_gcd(2, 4, 6) == (1, 2, 3) + raises(TypeError, lambda: _remove_gcd((2, 4, 6))) + assert sqf_normal(2*3**2*5, 2*5*11, 2*7**2*11) == \ + (11, 1, 5) + + # it's ok if these pass some day when the solvers are implemented + raises(NotImplementedError, lambda: diophantine(x**2 + y**2 + x*y + 2*y*z - 12)) + raises(NotImplementedError, lambda: diophantine(x**3 + y**2)) + assert diop_quadratic(x**2 + y**2 - 1**2 - 3**4) == \ + {(-9, -1), (-9, 1), (-1, -9), (-1, 9), (1, -9), (1, 9), (9, -1), (9, 1)} + + +def test_holzer(): + # if the input is good, don't let it diverge in holzer() + # (but see test_fail_holzer below) + assert holzer(2, 7, 13, 4, 79, 23) == (2, 7, 13) + + # None in uv condition met; solution is not Holzer reduced + # so this will hopefully change but is here for coverage + assert holzer(2, 6, 2, 1, 1, 10) == (2, 6, 2) + + raises(ValueError, lambda: holzer(2, 7, 14, 4, 79, 23)) + + +@XFAIL +def test_fail_holzer(): + eq = lambda x, y, z: a*x**2 + b*y**2 - c*z**2 + a, b, c = 4, 79, 23 + x, y, z = xyz = 26, 1, 11 + X, Y, Z = ans = 2, 7, 13 + assert eq(*xyz) == 0 + assert eq(*ans) == 0 + assert max(a*x**2, b*y**2, c*z**2) <= a*b*c + assert max(a*X**2, b*Y**2, c*Z**2) <= a*b*c + h = holzer(x, y, z, a, b, c) + assert h == ans # it would be nice to get the smaller soln + + +def test_issue_9539(): + assert diophantine(6*w + 9*y + 20*x - z) == \ + {(t_0, t_1, t_1 + t_2, 6*t_0 + 29*t_1 + 9*t_2)} + + +def test_issue_8943(): + assert diophantine( + 3*(x**2 + y**2 + z**2) - 14*(x*y + y*z + z*x)) == \ + {(0, 0, 0)} + + +def test_diop_sum_of_even_powers(): + eq = x**4 + y**4 + z**4 - 2673 + assert diop_solve(eq) == {(3, 6, 6), (2, 4, 7)} + assert diop_general_sum_of_even_powers(eq, 2) == {(3, 6, 6), (2, 4, 7)} + raises(NotImplementedError, lambda: diop_general_sum_of_even_powers(-eq, 2)) + neg = symbols('neg', negative=True) + eq = x**4 + y**4 + neg**4 - 2673 + assert diop_general_sum_of_even_powers(eq) == {(-3, 6, 6)} + assert diophantine(x**4 + y**4 + 2) == set() + assert diop_general_sum_of_even_powers(x**4 + y**4 - 2, limit=0) == set() + + +def test_sum_of_squares_powers(): + tru = {(0, 0, 1, 1, 11), (0, 0, 5, 7, 7), (0, 1, 3, 7, 8), (0, 1, 4, 5, 9), (0, 3, 4, 7, 7), (0, 3, 5, 5, 8), + (1, 1, 2, 6, 9), (1, 1, 6, 6, 7), (1, 2, 3, 3, 10), (1, 3, 4, 4, 9), (1, 5, 5, 6, 6), (2, 2, 3, 5, 9), + (2, 3, 5, 6, 7), (3, 3, 4, 5, 8)} + eq = u**2 + v**2 + x**2 + y**2 + z**2 - 123 + ans = diop_general_sum_of_squares(eq, oo) # allow oo to be used + assert len(ans) == 14 + assert ans == tru + + raises(ValueError, lambda: list(sum_of_squares(10, -1))) + assert list(sum_of_squares(1, 1)) == [(1,)] + assert list(sum_of_squares(1, 2)) == [] + assert list(sum_of_squares(1, 2, True)) == [(0, 1)] + assert list(sum_of_squares(-10, 2)) == [] + assert list(sum_of_squares(2, 3)) == [] + assert list(sum_of_squares(0, 3, True)) == [(0, 0, 0)] + assert list(sum_of_squares(0, 3)) == [] + assert list(sum_of_squares(4, 1)) == [(2,)] + assert list(sum_of_squares(5, 1)) == [] + assert list(sum_of_squares(50, 2)) == [(5, 5), (1, 7)] + assert list(sum_of_squares(11, 5, True)) == [ + (1, 1, 1, 2, 2), (0, 0, 1, 1, 3)] + assert list(sum_of_squares(8, 8)) == [(1, 1, 1, 1, 1, 1, 1, 1)] + + assert [len(list(sum_of_squares(i, 5, True))) for i in range(30)] == [ + 1, 1, 1, 1, 2, + 2, 1, 1, 2, 2, + 2, 2, 2, 3, 2, + 1, 3, 3, 3, 3, + 4, 3, 3, 2, 2, + 4, 4, 4, 4, 5] + assert [len(list(sum_of_squares(i, 5))) for i in range(30)] == [ + 0, 0, 0, 0, 0, + 1, 0, 0, 1, 0, + 0, 1, 0, 1, 1, + 0, 1, 1, 0, 1, + 2, 1, 1, 1, 1, + 1, 1, 1, 1, 3] + for i in range(30): + s1 = set(sum_of_squares(i, 5, True)) + assert not s1 or all(sum(j**2 for j in t) == i for t in s1) + s2 = set(sum_of_squares(i, 5)) + assert all(sum(j**2 for j in t) == i for t in s2) + + raises(ValueError, lambda: list(sum_of_powers(2, -1, 1))) + raises(ValueError, lambda: list(sum_of_powers(2, 1, -1))) + assert list(sum_of_powers(-2, 3, 2)) == [(-1, -1)] + assert list(sum_of_powers(-2, 4, 2)) == [] + assert list(sum_of_powers(2, 1, 1)) == [(2,)] + assert list(sum_of_powers(2, 1, 3, True)) == [(0, 0, 2), (0, 1, 1)] + assert list(sum_of_powers(5, 1, 2, True)) == [(0, 5), (1, 4), (2, 3)] + assert list(sum_of_powers(6, 2, 2)) == [] + assert list(sum_of_powers(3**5, 3, 1)) == [] + assert list(sum_of_powers(3**6, 3, 1)) == [(9,)] and (9**3 == 3**6) + assert list(sum_of_powers(2**1000, 5, 2)) == [] + + +def test__can_do_sum_of_squares(): + assert _can_do_sum_of_squares(3, -1) is False + assert _can_do_sum_of_squares(-3, 1) is False + assert _can_do_sum_of_squares(0, 1) + assert _can_do_sum_of_squares(4, 1) + assert _can_do_sum_of_squares(1, 2) + assert _can_do_sum_of_squares(2, 2) + assert _can_do_sum_of_squares(3, 2) is False + + +def test_diophantine_permute_sign(): + from sympy.abc import a, b, c, d, e + eq = a**4 + b**4 - (2**4 + 3**4) + base_sol = {(2, 3)} + assert diophantine(eq) == base_sol + complete_soln = set(signed_permutations(base_sol.pop())) + assert diophantine(eq, permute=True) == complete_soln + + eq = a**2 + b**2 + c**2 + d**2 + e**2 - 234 + assert len(diophantine(eq)) == 35 + assert len(diophantine(eq, permute=True)) == 62000 + soln = {(-1, -1), (-1, 2), (1, -2), (1, 1)} + assert diophantine(10*x**2 + 12*x*y + 12*y**2 - 34, permute=True) == soln + + +@XFAIL +def test_not_implemented(): + eq = x**2 + y**4 - 1**2 - 3**4 + assert diophantine(eq, syms=[x, y]) == {(9, 1), (1, 3)} + + +def test_issue_9538(): + eq = x - 3*y + 2 + assert diophantine(eq, syms=[y,x]) == {(t_0, 3*t_0 - 2)} + raises(TypeError, lambda: diophantine(eq, syms={y, x})) + + +def test_ternary_quadratic(): + # solution with 3 parameters + s = diophantine(2*x**2 + y**2 - 2*z**2) + p, q, r = ordered(S(s).free_symbols) + assert s == {( + p**2 - 2*q**2, + -2*p**2 + 4*p*q - 4*p*r - 4*q**2, + p**2 - 4*p*q + 2*q**2 - 4*q*r)} + # solution with Mul in solution + s = diophantine(x**2 + 2*y**2 - 2*z**2) + assert s == {(4*p*q, p**2 - 2*q**2, p**2 + 2*q**2)} + # solution with no Mul in solution + s = diophantine(2*x**2 + 2*y**2 - z**2) + assert s == {(2*p**2 - q**2, -2*p**2 + 4*p*q - q**2, + 4*p**2 - 4*p*q + 2*q**2)} + # reduced form when parametrized + s = diophantine(3*x**2 + 72*y**2 - 27*z**2) + assert s == {(24*p**2 - 9*q**2, 6*p*q, 8*p**2 + 3*q**2)} + assert parametrize_ternary_quadratic( + 3*x**2 + 2*y**2 - z**2 - 2*x*y + 5*y*z - 7*y*z) == ( + 2*p**2 - 2*p*q - q**2, 2*p**2 + 2*p*q - q**2, 2*p**2 - + 2*p*q + 3*q**2) + assert parametrize_ternary_quadratic( + 124*x**2 - 30*y**2 - 7729*z**2) == ( + -1410*p**2 - 363263*q**2, 2700*p**2 + 30916*p*q - + 695610*q**2, -60*p**2 + 5400*p*q + 15458*q**2) + + +def test_diophantine_solution_set(): + s1 = DiophantineSolutionSet([], []) + assert set(s1) == set() + assert s1.symbols == () + assert s1.parameters == () + raises(ValueError, lambda: s1.add((x,))) + assert list(s1.dict_iterator()) == [] + + s2 = DiophantineSolutionSet([x, y], [t, u]) + assert s2.symbols == (x, y) + assert s2.parameters == (t, u) + raises(ValueError, lambda: s2.add((1,))) + s2.add((3, 4)) + assert set(s2) == {(3, 4)} + s2.update((3, 4), (-1, u)) + assert set(s2) == {(3, 4), (-1, u)} + raises(ValueError, lambda: s1.update(s2)) + assert list(s2.dict_iterator()) == [{x: -1, y: u}, {x: 3, y: 4}] + + s3 = DiophantineSolutionSet([x, y, z], [t, u]) + assert len(s3.parameters) == 2 + s3.add((t**2 + u, t - u, 1)) + assert set(s3) == {(t**2 + u, t - u, 1)} + assert s3.subs(t, 2) == {(u + 4, 2 - u, 1)} + assert s3(2) == {(u + 4, 2 - u, 1)} + assert s3.subs({t: 7, u: 8}) == {(57, -1, 1)} + assert s3(7, 8) == {(57, -1, 1)} + assert s3.subs({t: 5}) == {(u + 25, 5 - u, 1)} + assert s3(5) == {(u + 25, 5 - u, 1)} + assert s3.subs(u, -3) == {(t**2 - 3, t + 3, 1)} + assert s3(None, -3) == {(t**2 - 3, t + 3, 1)} + assert s3.subs({t: 2, u: 8}) == {(12, -6, 1)} + assert s3(2, 8) == {(12, -6, 1)} + assert s3.subs({t: 5, u: -3}) == {(22, 8, 1)} + assert s3(5, -3) == {(22, 8, 1)} + raises(TypeError, lambda: s3.subs(x=1)) + raises(TypeError, lambda: s3.subs(1, 2, 3)) + raises(ValueError, lambda: s3.add(())) + raises(ValueError, lambda: s3.add((1, 2, 3, 4))) + raises(ValueError, lambda: s3.add((1, 2))) + raises(ValueError, lambda: s3(1, 2, 3)) + raises(TypeError, lambda: s3(t=1)) + + s4 = DiophantineSolutionSet([x, y], [t, u]) + s4.add((t, 11*t)) + s4.add((-t, 22*t)) + assert s4(0, 0) == {(0, 0)} + + +def test_quadratic_parameter_passing(): + eq = -33*x*y + 3*y**2 + solution = BinaryQuadratic(eq).solve(parameters=[t, u]) + # test that parameters are passed all the way to the final solution + assert solution == {(t, 11*t), (t, -22*t)} + assert solution(0, 0) == {(0, 0)} + +def test_issue_18628(): + eq1 = x**2 - 15*x + y**2 - 8*y + sol = diophantine(eq1) + assert sol == {(15, 0), (15, 8), (-1, 4), (0, 0), (0, 8), (16, 4)} + eq2 = 2*x**2 - 9*x + 4*y**2 - 8*y + 14 + sol = diophantine(eq2) + assert sol == {(2, 1)} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/inequalities.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/inequalities.py new file mode 100644 index 0000000000000000000000000000000000000000..f50f7a7572ff25e8f48a4214d7b0c5ec6b5b35f3 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/inequalities.py @@ -0,0 +1,986 @@ +"""Tools for solving inequalities and systems of inequalities. """ +import itertools + +from sympy.calculus.util import (continuous_domain, periodicity, + function_range) +from sympy.core import sympify +from sympy.core.exprtools import factor_terms +from sympy.core.relational import Relational, Lt, Ge, Eq +from sympy.core.symbol import Symbol, Dummy +from sympy.sets.sets import Interval, FiniteSet, Union, Intersection +from sympy.core.singleton import S +from sympy.core.function import expand_mul +from sympy.functions.elementary.complexes import Abs +from sympy.logic import And +from sympy.polys import Poly, PolynomialError, parallel_poly_from_expr +from sympy.polys.polyutils import _nsort +from sympy.solvers.solveset import solvify, solveset +from sympy.utilities.iterables import sift, iterable +from sympy.utilities.misc import filldedent + + +def solve_poly_inequality(poly, rel): + """Solve a polynomial inequality with rational coefficients. + + Examples + ======== + + >>> from sympy import solve_poly_inequality, Poly + >>> from sympy.abc import x + + >>> solve_poly_inequality(Poly(x, x, domain='ZZ'), '==') + [{0}] + + >>> solve_poly_inequality(Poly(x**2 - 1, x, domain='ZZ'), '!=') + [Interval.open(-oo, -1), Interval.open(-1, 1), Interval.open(1, oo)] + + >>> solve_poly_inequality(Poly(x**2 - 1, x, domain='ZZ'), '==') + [{-1}, {1}] + + See Also + ======== + solve_poly_inequalities + """ + if not isinstance(poly, Poly): + raise ValueError( + 'For efficiency reasons, `poly` should be a Poly instance') + if poly.as_expr().is_number: + t = Relational(poly.as_expr(), 0, rel) + if t is S.true: + return [S.Reals] + elif t is S.false: + return [S.EmptySet] + else: + raise NotImplementedError( + "could not determine truth value of %s" % t) + + reals, intervals = poly.real_roots(multiple=False), [] + + if rel == '==': + for root, _ in reals: + interval = Interval(root, root) + intervals.append(interval) + elif rel == '!=': + left = S.NegativeInfinity + + for right, _ in reals + [(S.Infinity, 1)]: + interval = Interval(left, right, True, True) + intervals.append(interval) + left = right + else: + if poly.LC() > 0: + sign = +1 + else: + sign = -1 + + eq_sign, equal = None, False + + if rel == '>': + eq_sign = +1 + elif rel == '<': + eq_sign = -1 + elif rel == '>=': + eq_sign, equal = +1, True + elif rel == '<=': + eq_sign, equal = -1, True + else: + raise ValueError("'%s' is not a valid relation" % rel) + + right, right_open = S.Infinity, True + + for left, multiplicity in reversed(reals): + if multiplicity % 2: + if sign == eq_sign: + intervals.insert( + 0, Interval(left, right, not equal, right_open)) + + sign, right, right_open = -sign, left, not equal + else: + if sign == eq_sign and not equal: + intervals.insert( + 0, Interval(left, right, True, right_open)) + right, right_open = left, True + elif sign != eq_sign and equal: + intervals.insert(0, Interval(left, left)) + + if sign == eq_sign: + intervals.insert( + 0, Interval(S.NegativeInfinity, right, True, right_open)) + + return intervals + + +def solve_poly_inequalities(polys): + """Solve polynomial inequalities with rational coefficients. + + Examples + ======== + + >>> from sympy import Poly + >>> from sympy.solvers.inequalities import solve_poly_inequalities + >>> from sympy.abc import x + >>> solve_poly_inequalities((( + ... Poly(x**2 - 3), ">"), ( + ... Poly(-x**2 + 1), ">"))) + Union(Interval.open(-oo, -sqrt(3)), Interval.open(-1, 1), Interval.open(sqrt(3), oo)) + """ + return Union(*[s for p in polys for s in solve_poly_inequality(*p)]) + + +def solve_rational_inequalities(eqs): + """Solve a system of rational inequalities with rational coefficients. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import solve_rational_inequalities, Poly + + >>> solve_rational_inequalities([[ + ... ((Poly(-x + 1), Poly(1, x)), '>='), + ... ((Poly(-x + 1), Poly(1, x)), '<=')]]) + {1} + + >>> solve_rational_inequalities([[ + ... ((Poly(x), Poly(1, x)), '!='), + ... ((Poly(-x + 1), Poly(1, x)), '>=')]]) + Union(Interval.open(-oo, 0), Interval.Lopen(0, 1)) + + See Also + ======== + solve_poly_inequality + """ + result = S.EmptySet + + for _eqs in eqs: + if not _eqs: + continue + + global_intervals = [Interval(S.NegativeInfinity, S.Infinity)] + + for (numer, denom), rel in _eqs: + numer_intervals = solve_poly_inequality(numer*denom, rel) + denom_intervals = solve_poly_inequality(denom, '==') + + intervals = [] + + for numer_interval, global_interval in itertools.product( + numer_intervals, global_intervals): + interval = numer_interval.intersect(global_interval) + + if interval is not S.EmptySet: + intervals.append(interval) + + global_intervals = intervals + + intervals = [] + + for global_interval in global_intervals: + for denom_interval in denom_intervals: + global_interval -= denom_interval + + if global_interval is not S.EmptySet: + intervals.append(global_interval) + + global_intervals = intervals + + if not global_intervals: + break + + for interval in global_intervals: + result = result.union(interval) + + return result + + +def reduce_rational_inequalities(exprs, gen, relational=True): + """Reduce a system of rational inequalities with rational coefficients. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.solvers.inequalities import reduce_rational_inequalities + + >>> x = Symbol('x', real=True) + + >>> reduce_rational_inequalities([[x**2 <= 0]], x) + Eq(x, 0) + + >>> reduce_rational_inequalities([[x + 2 > 0]], x) + -2 < x + >>> reduce_rational_inequalities([[(x + 2, ">")]], x) + -2 < x + >>> reduce_rational_inequalities([[x + 2]], x) + Eq(x, -2) + + This function find the non-infinite solution set so if the unknown symbol + is declared as extended real rather than real then the result may include + finiteness conditions: + + >>> y = Symbol('y', extended_real=True) + >>> reduce_rational_inequalities([[y + 2 > 0]], y) + (-2 < y) & (y < oo) + """ + exact = True + eqs = [] + solution = S.EmptySet # add pieces for each group + for _exprs in exprs: + if not _exprs: + continue + _eqs = [] + _sol = S.Reals + for expr in _exprs: + if isinstance(expr, tuple): + expr, rel = expr + else: + if expr.is_Relational: + expr, rel = expr.lhs - expr.rhs, expr.rel_op + else: + rel = '==' + + if expr is S.true: + numer, denom, rel = S.Zero, S.One, '==' + elif expr is S.false: + numer, denom, rel = S.One, S.One, '==' + else: + numer, denom = expr.together().as_numer_denom() + + try: + (numer, denom), opt = parallel_poly_from_expr( + (numer, denom), gen) + except PolynomialError: + raise PolynomialError(filldedent(''' + only polynomials and rational functions are + supported in this context. + ''')) + + if not opt.domain.is_Exact: + numer, denom, exact = numer.to_exact(), denom.to_exact(), False + + domain = opt.domain.get_exact() + + if not (domain.is_ZZ or domain.is_QQ): + expr = numer/denom + expr = Relational(expr, 0, rel) + _sol &= solve_univariate_inequality(expr, gen, relational=False) + else: + _eqs.append(((numer, denom), rel)) + + if _eqs: + _sol &= solve_rational_inequalities([_eqs]) + exclude = solve_rational_inequalities([[((d, d.one), '==') + for i in eqs for ((n, d), _) in i if d.has(gen)]]) + _sol -= exclude + + solution |= _sol + + if not exact and solution: + solution = solution.evalf() + + if relational: + solution = solution.as_relational(gen) + + return solution + + +def reduce_abs_inequality(expr, rel, gen): + """Reduce an inequality with nested absolute values. + + Examples + ======== + + >>> from sympy import reduce_abs_inequality, Abs, Symbol + >>> x = Symbol('x', real=True) + + >>> reduce_abs_inequality(Abs(x - 5) - 3, '<', x) + (2 < x) & (x < 8) + + >>> reduce_abs_inequality(Abs(x + 2)*3 - 13, '<', x) + (-19/3 < x) & (x < 7/3) + + See Also + ======== + + reduce_abs_inequalities + """ + if gen.is_extended_real is False: + raise TypeError(filldedent(''' + Cannot solve inequalities with absolute values containing + non-real variables. + ''')) + + def _bottom_up_scan(expr): + exprs = [] + + if expr.is_Add or expr.is_Mul: + op = expr.func + + for arg in expr.args: + _exprs = _bottom_up_scan(arg) + + if not exprs: + exprs = _exprs + else: + exprs = [(op(expr, _expr), conds + _conds) for (expr, conds), (_expr, _conds) in + itertools.product(exprs, _exprs)] + elif expr.is_Pow: + n = expr.exp + if not n.is_Integer: + raise ValueError("Only Integer Powers are allowed on Abs.") + + exprs.extend((expr**n, conds) for expr, conds in _bottom_up_scan(expr.base)) + elif isinstance(expr, Abs): + _exprs = _bottom_up_scan(expr.args[0]) + + for expr, conds in _exprs: + exprs.append(( expr, conds + [Ge(expr, 0)])) + exprs.append((-expr, conds + [Lt(expr, 0)])) + else: + exprs = [(expr, [])] + + return exprs + + mapping = {'<': '>', '<=': '>='} + inequalities = [] + + for expr, conds in _bottom_up_scan(expr): + if rel not in mapping.keys(): + expr = Relational( expr, 0, rel) + else: + expr = Relational(-expr, 0, mapping[rel]) + + inequalities.append([expr] + conds) + + return reduce_rational_inequalities(inequalities, gen) + + +def reduce_abs_inequalities(exprs, gen): + """Reduce a system of inequalities with nested absolute values. + + Examples + ======== + + >>> from sympy import reduce_abs_inequalities, Abs, Symbol + >>> x = Symbol('x', extended_real=True) + + >>> reduce_abs_inequalities([(Abs(3*x - 5) - 7, '<'), + ... (Abs(x + 25) - 13, '>')], x) + (-2/3 < x) & (x < 4) & (((-oo < x) & (x < -38)) | ((-12 < x) & (x < oo))) + + >>> reduce_abs_inequalities([(Abs(x - 4) + Abs(3*x - 5) - 7, '<')], x) + (1/2 < x) & (x < 4) + + See Also + ======== + + reduce_abs_inequality + """ + return And(*[ reduce_abs_inequality(expr, rel, gen) + for expr, rel in exprs ]) + + +def solve_univariate_inequality(expr, gen, relational=True, domain=S.Reals, continuous=False): + """Solves a real univariate inequality. + + Parameters + ========== + + expr : Relational + The target inequality + gen : Symbol + The variable for which the inequality is solved + relational : bool + A Relational type output is expected or not + domain : Set + The domain over which the equation is solved + continuous: bool + True if expr is known to be continuous over the given domain + (and so continuous_domain() does not need to be called on it) + + Raises + ====== + + NotImplementedError + The solution of the inequality cannot be determined due to limitation + in :func:`sympy.solvers.solveset.solvify`. + + Notes + ===== + + Currently, we cannot solve all the inequalities due to limitations in + :func:`sympy.solvers.solveset.solvify`. Also, the solution returned for trigonometric inequalities + are restricted in its periodic interval. + + See Also + ======== + + sympy.solvers.solveset.solvify: solver returning solveset solutions with solve's output API + + Examples + ======== + + >>> from sympy import solve_univariate_inequality, Symbol, sin, Interval, S + >>> x = Symbol('x') + + >>> solve_univariate_inequality(x**2 >= 4, x) + ((2 <= x) & (x < oo)) | ((-oo < x) & (x <= -2)) + + >>> solve_univariate_inequality(x**2 >= 4, x, relational=False) + Union(Interval(-oo, -2), Interval(2, oo)) + + >>> domain = Interval(0, S.Infinity) + >>> solve_univariate_inequality(x**2 >= 4, x, False, domain) + Interval(2, oo) + + >>> solve_univariate_inequality(sin(x) > 0, x, relational=False) + Interval.open(0, pi) + + """ + from sympy.solvers.solvers import denoms + + if domain.is_subset(S.Reals) is False: + raise NotImplementedError(filldedent(''' + Inequalities in the complex domain are + not supported. Try the real domain by + setting domain=S.Reals''')) + elif domain is not S.Reals: + rv = solve_univariate_inequality( + expr, gen, relational=False, continuous=continuous).intersection(domain) + if relational: + rv = rv.as_relational(gen) + return rv + else: + pass # continue with attempt to solve in Real domain + + # This keeps the function independent of the assumptions about `gen`. + # `solveset` makes sure this function is called only when the domain is + # real. + _gen = gen + _domain = domain + if gen.is_extended_real is False: + rv = S.EmptySet + return rv if not relational else rv.as_relational(_gen) + elif gen.is_extended_real is None: + gen = Dummy('gen', extended_real=True) + try: + expr = expr.xreplace({_gen: gen}) + except TypeError: + raise TypeError(filldedent(''' + When gen is real, the relational has a complex part + which leads to an invalid comparison like I < 0. + ''')) + + rv = None + + if expr is S.true: + rv = domain + + elif expr is S.false: + rv = S.EmptySet + + else: + e = expr.lhs - expr.rhs + period = periodicity(e, gen) + if period == S.Zero: + e = expand_mul(e) + const = expr.func(e, 0) + if const is S.true: + rv = domain + elif const is S.false: + rv = S.EmptySet + elif period is not None: + frange = function_range(e, gen, domain) + + rel = expr.rel_op + if rel in ('<', '<='): + if expr.func(frange.sup, 0): + rv = domain + elif not expr.func(frange.inf, 0): + rv = S.EmptySet + + elif rel in ('>', '>='): + if expr.func(frange.inf, 0): + rv = domain + elif not expr.func(frange.sup, 0): + rv = S.EmptySet + + inf, sup = domain.inf, domain.sup + if sup - inf is S.Infinity: + domain = Interval(0, period, False, True).intersect(_domain) + _domain = domain + + if rv is None: + n, d = e.as_numer_denom() + try: + if gen not in n.free_symbols and len(e.free_symbols) > 1: + raise ValueError + # this might raise ValueError on its own + # or it might give None... + solns = solvify(e, gen, domain) + if solns is None: + # in which case we raise ValueError + raise ValueError + except (ValueError, NotImplementedError): + # replace gen with generic x since it's + # univariate anyway + raise NotImplementedError(filldedent(''' + The inequality, %s, cannot be solved using + solve_univariate_inequality. + ''' % expr.subs(gen, Symbol('x')))) + + expanded_e = expand_mul(e) + def valid(x): + # this is used to see if gen=x satisfies the + # relational by substituting it into the + # expanded form and testing against 0, e.g. + # if expr = x*(x + 1) < 2 then e = x*(x + 1) - 2 + # and expanded_e = x**2 + x - 2; the test is + # whether a given value of x satisfies + # x**2 + x - 2 < 0 + # + # expanded_e, expr and gen used from enclosing scope + v = expanded_e.subs(gen, expand_mul(x)) + try: + r = expr.func(v, 0) + except TypeError: + r = S.false + if r in (S.true, S.false): + return r + if v.is_extended_real is False: + return S.false + else: + v = v.n(2) + if v.is_comparable: + return expr.func(v, 0) + # not comparable or couldn't be evaluated + raise NotImplementedError( + 'relationship did not evaluate: %s' % r) + + singularities = [] + for d in denoms(expr, gen): + singularities.extend(solvify(d, gen, domain)) + if not continuous: + domain = continuous_domain(expanded_e, gen, domain) + + include_x = '=' in expr.rel_op and expr.rel_op != '!=' + + try: + discontinuities = set(domain.boundary - + FiniteSet(domain.inf, domain.sup)) + # remove points that are not between inf and sup of domain + critical_points = FiniteSet(*(solns + singularities + list( + discontinuities))).intersection( + Interval(domain.inf, domain.sup, + domain.inf not in domain, domain.sup not in domain)) + if all(r.is_number for r in critical_points): + reals = _nsort(critical_points, separated=True)[0] + else: + sifted = sift(critical_points, lambda x: x.is_extended_real) + if sifted[None]: + # there were some roots that weren't known + # to be real + raise NotImplementedError + try: + reals = sifted[True] + if len(reals) > 1: + reals = sorted(reals) + except TypeError: + raise NotImplementedError + except NotImplementedError: + raise NotImplementedError('sorting of these roots is not supported') + + # If expr contains imaginary coefficients, only take real + # values of x for which the imaginary part is 0 + make_real = S.Reals + if (coeffI := expanded_e.coeff(S.ImaginaryUnit)) != S.Zero: + check = True + im_sol = FiniteSet() + try: + a = solveset(coeffI, gen, domain) + if not isinstance(a, Interval): + for z in a: + if z not in singularities and valid(z) and z.is_extended_real: + im_sol += FiniteSet(z) + else: + start, end = a.inf, a.sup + for z in _nsort(critical_points + FiniteSet(end)): + valid_start = valid(start) + if start != end: + valid_z = valid(z) + pt = _pt(start, z) + if pt not in singularities and pt.is_extended_real and valid(pt): + if valid_start and valid_z: + im_sol += Interval(start, z) + elif valid_start: + im_sol += Interval.Ropen(start, z) + elif valid_z: + im_sol += Interval.Lopen(start, z) + else: + im_sol += Interval.open(start, z) + start = z + for s in singularities: + im_sol -= FiniteSet(s) + except (TypeError): + im_sol = S.Reals + check = False + + if im_sol is S.EmptySet: + raise ValueError(filldedent(''' + %s contains imaginary parts which cannot be + made 0 for any value of %s satisfying the + inequality, leading to relations like I < 0. + ''' % (expr.subs(gen, _gen), _gen))) + + make_real = make_real.intersect(im_sol) + + sol_sets = [S.EmptySet] + + start = domain.inf + if start in domain and valid(start) and start.is_finite: + sol_sets.append(FiniteSet(start)) + + for x in reals: + end = x + + if valid(_pt(start, end)): + sol_sets.append(Interval(start, end, True, True)) + + if x in singularities: + singularities.remove(x) + else: + if x in discontinuities: + discontinuities.remove(x) + _valid = valid(x) + else: # it's a solution + _valid = include_x + if _valid: + sol_sets.append(FiniteSet(x)) + + start = end + + end = domain.sup + if end in domain and valid(end) and end.is_finite: + sol_sets.append(FiniteSet(end)) + + if valid(_pt(start, end)): + sol_sets.append(Interval.open(start, end)) + + if coeffI != S.Zero and check: + rv = (make_real).intersect(_domain) + else: + rv = Intersection( + (Union(*sol_sets)), make_real, _domain).subs(gen, _gen) + + return rv if not relational else rv.as_relational(_gen) + + +def _pt(start, end): + """Return a point between start and end""" + if not start.is_infinite and not end.is_infinite: + pt = (start + end)/2 + elif start.is_infinite and end.is_infinite: + pt = S.Zero + else: + if (start.is_infinite and start.is_extended_positive is None or + end.is_infinite and end.is_extended_positive is None): + raise ValueError('cannot proceed with unsigned infinite values') + if (end.is_infinite and end.is_extended_negative or + start.is_infinite and start.is_extended_positive): + start, end = end, start + # if possible, use a multiple of self which has + # better behavior when checking assumptions than + # an expression obtained by adding or subtracting 1 + if end.is_infinite: + if start.is_extended_positive: + pt = start*2 + elif start.is_extended_negative: + pt = start*S.Half + else: + pt = start + 1 + elif start.is_infinite: + if end.is_extended_positive: + pt = end*S.Half + elif end.is_extended_negative: + pt = end*2 + else: + pt = end - 1 + return pt + + +def _solve_inequality(ie, s, linear=False): + """Return the inequality with s isolated on the left, if possible. + If the relationship is non-linear, a solution involving And or Or + may be returned. False or True are returned if the relationship + is never True or always True, respectively. + + If `linear` is True (default is False) an `s`-dependent expression + will be isolated on the left, if possible + but it will not be solved for `s` unless the expression is linear + in `s`. Furthermore, only "safe" operations which do not change the + sense of the relationship are applied: no division by an unsigned + value is attempted unless the relationship involves Eq or Ne and + no division by a value not known to be nonzero is ever attempted. + + Examples + ======== + + >>> from sympy import Eq, Symbol + >>> from sympy.solvers.inequalities import _solve_inequality as f + >>> from sympy.abc import x, y + + For linear expressions, the symbol can be isolated: + + >>> f(x - 2 < 0, x) + x < 2 + >>> f(-x - 6 < x, x) + x > -3 + + Sometimes nonlinear relationships will be False + + >>> f(x**2 + 4 < 0, x) + False + + Or they may involve more than one region of values: + + >>> f(x**2 - 4 < 0, x) + (-2 < x) & (x < 2) + + To restrict the solution to a relational, set linear=True + and only the x-dependent portion will be isolated on the left: + + >>> f(x**2 - 4 < 0, x, linear=True) + x**2 < 4 + + Division of only nonzero quantities is allowed, so x cannot + be isolated by dividing by y: + + >>> y.is_nonzero is None # it is unknown whether it is 0 or not + True + >>> f(x*y < 1, x) + x*y < 1 + + And while an equality (or inequality) still holds after dividing by a + non-zero quantity + + >>> nz = Symbol('nz', nonzero=True) + >>> f(Eq(x*nz, 1), x) + Eq(x, 1/nz) + + the sign must be known for other inequalities involving > or <: + + >>> f(x*nz <= 1, x) + nz*x <= 1 + >>> p = Symbol('p', positive=True) + >>> f(x*p <= 1, x) + x <= 1/p + + When there are denominators in the original expression that + are removed by expansion, conditions for them will be returned + as part of the result: + + >>> f(x < x*(2/x - 1), x) + (x < 1) & Ne(x, 0) + """ + from sympy.solvers.solvers import denoms + if s not in ie.free_symbols: + return ie + if ie.rhs == s: + ie = ie.reversed + if ie.lhs == s and s not in ie.rhs.free_symbols: + return ie + + def classify(ie, s, i): + # return True or False if ie evaluates when substituting s with + # i else None (if unevaluated) or NaN (when there is an error + # in evaluating) + try: + v = ie.subs(s, i) + if v is S.NaN: + return v + elif v not in (True, False): + return + return v + except TypeError: + return S.NaN + + rv = None + oo = S.Infinity + expr = ie.lhs - ie.rhs + try: + p = Poly(expr, s) + if p.degree() == 0: + rv = ie.func(p.as_expr(), 0) + elif not linear and p.degree() > 1: + # handle in except clause + raise NotImplementedError + except (PolynomialError, NotImplementedError): + if not linear: + try: + rv = reduce_rational_inequalities([[ie]], s) + except PolynomialError: + rv = solve_univariate_inequality(ie, s) + # remove restrictions wrt +/-oo that may have been + # applied when using sets to simplify the relationship + okoo = classify(ie, s, oo) + if okoo is S.true and classify(rv, s, oo) is S.false: + rv = rv.subs(s < oo, True) + oknoo = classify(ie, s, -oo) + if (oknoo is S.true and + classify(rv, s, -oo) is S.false): + rv = rv.subs(-oo < s, True) + rv = rv.subs(s > -oo, True) + if rv is S.true: + rv = (s <= oo) if okoo is S.true else (s < oo) + if oknoo is not S.true: + rv = And(-oo < s, rv) + else: + p = Poly(expr) + + conds = [] + if rv is None: + e = p.as_expr() # this is in expanded form + # Do a safe inversion of e, moving non-s terms + # to the rhs and dividing by a nonzero factor if + # the relational is Eq/Ne; for other relationals + # the sign must also be positive or negative + rhs = 0 + b, ax = e.as_independent(s, as_Add=True) + e -= b + rhs -= b + ef = factor_terms(e) + a, e = ef.as_independent(s, as_Add=False) + if (a.is_zero != False or # don't divide by potential 0 + a.is_negative == + a.is_positive is None and # if sign is not known then + ie.rel_op not in ('!=', '==')): # reject if not Eq/Ne + e = ef + a = S.One + rhs /= a + if a.is_positive: + rv = ie.func(e, rhs) + else: + rv = ie.reversed.func(e, rhs) + + # return conditions under which the value is + # valid, too. + beginning_denoms = denoms(ie.lhs) | denoms(ie.rhs) + current_denoms = denoms(rv) + for d in beginning_denoms - current_denoms: + c = _solve_inequality(Eq(d, 0), s, linear=linear) + if isinstance(c, Eq) and c.lhs == s: + if classify(rv, s, c.rhs) is S.true: + # rv is permitting this value but it shouldn't + conds.append(~c) + for i in (-oo, oo): + if (classify(rv, s, i) is S.true and + classify(ie, s, i) is not S.true): + conds.append(s < i if i is oo else i < s) + + conds.append(rv) + return And(*conds) + + +def _reduce_inequalities(inequalities, symbols): + # helper for reduce_inequalities + + poly_part, abs_part = {}, {} + other = [] + + for inequality in inequalities: + + expr, rel = inequality.lhs, inequality.rel_op # rhs is 0 + + # check for gens using atoms which is more strict than free_symbols to + # guard against EX domain which won't be handled by + # reduce_rational_inequalities + gens = expr.atoms(Symbol) + + if len(gens) == 1: + gen = gens.pop() + else: + common = expr.free_symbols & symbols + if len(common) == 1: + gen = common.pop() + other.append(_solve_inequality(Relational(expr, 0, rel), gen)) + continue + else: + raise NotImplementedError(filldedent(''' + inequality has more than one symbol of interest. + ''')) + + if expr.is_polynomial(gen): + poly_part.setdefault(gen, []).append((expr, rel)) + else: + components = expr.find(lambda u: + u.has(gen) and ( + u.is_Function or u.is_Pow and not u.exp.is_Integer)) + if components and all(isinstance(i, Abs) for i in components): + abs_part.setdefault(gen, []).append((expr, rel)) + else: + other.append(_solve_inequality(Relational(expr, 0, rel), gen)) + + poly_reduced = [reduce_rational_inequalities([exprs], gen) for gen, exprs in poly_part.items()] + abs_reduced = [reduce_abs_inequalities(exprs, gen) for gen, exprs in abs_part.items()] + + return And(*(poly_reduced + abs_reduced + other)) + + +def reduce_inequalities(inequalities, symbols=[]): + """Reduce a system of inequalities with rational coefficients. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import reduce_inequalities + + >>> reduce_inequalities(0 <= x + 3, []) + (-3 <= x) & (x < oo) + + >>> reduce_inequalities(0 <= x + y*2 - 1, [x]) + (x < oo) & (x >= 1 - 2*y) + """ + if not iterable(inequalities): + inequalities = [inequalities] + inequalities = [sympify(i) for i in inequalities] + + gens = set().union(*[i.free_symbols for i in inequalities]) + + if not iterable(symbols): + symbols = [symbols] + symbols = (set(symbols) or gens) & gens + if any(i.is_extended_real is False for i in symbols): + raise TypeError(filldedent(''' + inequalities cannot contain symbols that are not real. + ''')) + + # make vanilla symbol real + recast = {i: Dummy(i.name, extended_real=True) + for i in gens if i.is_extended_real is None} + inequalities = [i.xreplace(recast) for i in inequalities] + symbols = {i.xreplace(recast) for i in symbols} + + # prefilter + keep = [] + for i in inequalities: + if isinstance(i, Relational): + i = i.func(i.lhs.as_expr() - i.rhs.as_expr(), 0) + elif i not in (True, False): + i = Eq(i, 0) + if i == True: + continue + elif i == False: + return S.false + if i.lhs.is_number: + raise NotImplementedError( + "could not determine truth value of %s" % i) + keep.append(i) + inequalities = keep + del keep + + # solve system + rv = _reduce_inequalities(inequalities, symbols) + + # restore original symbols and return + return rv.xreplace({v: k for k, v in recast.items()}) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..2b543425251dea6380a1860279cb6d636f3dd629 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__init__.py @@ -0,0 +1,16 @@ +from .ode import (allhints, checkinfsol, classify_ode, + constantsimp, dsolve, homogeneous_order) + +from .lie_group import infinitesimals + +from .subscheck import checkodesol + +from .systems import (canonical_odes, linear_ode_to_matrix, + linodesolve) + + +__all__ = [ + 'allhints', 'checkinfsol', 'checkodesol', 'classify_ode', 'constantsimp', + 'dsolve', 'homogeneous_order', 'infinitesimals', 'canonical_odes', 'linear_ode_to_matrix', + 'linodesolve' +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__pycache__/__init__.cpython-310.pyc b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__pycache__/__init__.cpython-310.pyc new file mode 100644 index 0000000000000000000000000000000000000000..d12ce53e3a9b67185a26110205d68e0c76677395 Binary files /dev/null and b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__pycache__/__init__.cpython-310.pyc differ diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/__pycache__/hypergeometric.cpython-310.pyc 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This is an incomplete implementation of the algorithm described in [1]. +The algorithm solves 2nd order linear ODEs of the form + +.. math:: y'' + A(x) y' + B(x) y = 0\text{,} + +where `A` and `B` are rational functions. The algorithm should find any +solution of the form + +.. math:: y = P(x) _pF_q(..; ..;\frac{\alpha x^k + \beta}{\gamma x^k + \delta})\text{,} + +where pFq is any of 2F1, 1F1 or 0F1 and `P` is an "arbitrary function". +Currently only the 2F1 case is implemented in SymPy but the other cases are +described in the paper and could be implemented in future (contributions +welcome!). + +References +========== + +.. [1] L. Chan, E.S. Cheb-Terrab, Non-Liouvillian solutions for second order + linear ODEs, (2004). + https://arxiv.org/abs/math-ph/0402063 +''' + +from sympy.core import S, Pow +from sympy.core.function import expand +from sympy.core.relational import Eq +from sympy.core.symbol import Symbol, Wild +from sympy.functions import exp, sqrt, hyper +from sympy.integrals import Integral +from sympy.polys import roots, gcd +from sympy.polys.polytools import cancel, factor +from sympy.simplify import collect, simplify, logcombine # type: ignore +from sympy.simplify.powsimp import powdenest +from sympy.solvers.ode.ode import get_numbered_constants + + +def match_2nd_hypergeometric(eq, func): + x = func.args[0] + df = func.diff(x) + a3 = Wild('a3', exclude=[func, func.diff(x), func.diff(x, 2)]) + b3 = Wild('b3', exclude=[func, func.diff(x), func.diff(x, 2)]) + c3 = Wild('c3', exclude=[func, func.diff(x), func.diff(x, 2)]) + deq = a3*(func.diff(x, 2)) + b3*df + c3*func + r = collect(eq, + [func.diff(x, 2), func.diff(x), func]).match(deq) + if r: + if not all(val.is_polynomial() for val in r.values()): + n, d = eq.as_numer_denom() + eq = expand(n) + r = collect(eq, [func.diff(x, 2), func.diff(x), func]).match(deq) + + if r and r[a3]!=0: + A = cancel(r[b3]/r[a3]) + B = cancel(r[c3]/r[a3]) + return [A, B] + else: + return [] + + +def equivalence_hypergeometric(A, B, func): + # This method for finding the equivalence is only for 2F1 type. + # We can extend it for 1F1 and 0F1 type also. + x = func.args[0] + + # making given equation in normal form + I1 = factor(cancel(A.diff(x)/2 + A**2/4 - B)) + + # computing shifted invariant(J1) of the equation + J1 = factor(cancel(x**2*I1 + S(1)/4)) + num, dem = J1.as_numer_denom() + num = powdenest(expand(num)) + dem = powdenest(expand(dem)) + # this function will compute the different powers of variable(x) in J1. + # then it will help in finding value of k. k is power of x such that we can express + # J1 = x**k * J0(x**k) then all the powers in J0 become integers. + def _power_counting(num): + _pow = {0} + for val in num: + if val.has(x): + if isinstance(val, Pow) and val.as_base_exp()[0] == x: + _pow.add(val.as_base_exp()[1]) + elif val == x: + _pow.add(val.as_base_exp()[1]) + else: + _pow.update(_power_counting(val.args)) + return _pow + + pow_num = _power_counting((num, )) + pow_dem = _power_counting((dem, )) + pow_dem.update(pow_num) + + _pow = pow_dem + k = gcd(_pow) + + # computing I0 of the given equation + I0 = powdenest(simplify(factor(((J1/k**2) - S(1)/4)/((x**k)**2))), force=True) + I0 = factor(cancel(powdenest(I0.subs(x, x**(S(1)/k)), force=True))) + + # Before this point I0, J1 might be functions of e.g. sqrt(x) but replacing + # x with x**(1/k) should result in I0 being a rational function of x or + # otherwise the hypergeometric solver cannot be used. Note that k can be a + # non-integer rational such as 2/7. + if not I0.is_rational_function(x): + return None + + num, dem = I0.as_numer_denom() + + max_num_pow = max(_power_counting((num, ))) + dem_args = dem.args + sing_point = [] + dem_pow = [] + # calculating singular point of I0. + for arg in dem_args: + if arg.has(x): + if isinstance(arg, Pow): + # (x-a)**n + dem_pow.append(arg.as_base_exp()[1]) + sing_point.append(list(roots(arg.as_base_exp()[0], x).keys())[0]) + else: + # (x-a) type + dem_pow.append(arg.as_base_exp()[1]) + sing_point.append(list(roots(arg, x).keys())[0]) + + dem_pow.sort() + # checking if equivalence is exists or not. + + if equivalence(max_num_pow, dem_pow) == "2F1": + return {'I0':I0, 'k':k, 'sing_point':sing_point, 'type':"2F1"} + else: + return None + + +def match_2nd_2F1_hypergeometric(I, k, sing_point, func): + x = func.args[0] + a = Wild("a") + b = Wild("b") + c = Wild("c") + t = Wild("t") + s = Wild("s") + r = Wild("r") + alpha = Wild("alpha") + beta = Wild("beta") + gamma = Wild("gamma") + delta = Wild("delta") + # I0 of the standard 2F1 equation. + I0 = ((a-b+1)*(a-b-1)*x**2 + 2*((1-a-b)*c + 2*a*b)*x + c*(c-2))/(4*x**2*(x-1)**2) + if sing_point != [0, 1]: + # If singular point is [0, 1] then we have standard equation. + eqs = [] + sing_eqs = [-beta/alpha, -delta/gamma, (delta-beta)/(alpha-gamma)] + # making equations for the finding the mobius transformation + for i in range(3): + if i>> from sympy import Function, Eq, pprint + >>> from sympy.abc import x, y + >>> xi, eta, h = map(Function, ['xi', 'eta', 'h']) + >>> h = h(x, y) # dy/dx = h + >>> eta = eta(x, y) + >>> xi = xi(x, y) + >>> genform = Eq(eta.diff(x) + (eta.diff(y) - xi.diff(x))*h + ... - (xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y)), 0) + >>> pprint(genform) + /d d \ d 2 d d d + |--(eta(x, y)) - --(xi(x, y))|*h(x, y) - eta(x, y)*--(h(x, y)) - h (x, y)*--(xi(x, y)) - xi(x, y)*--(h(x, y)) + --(eta(x, y)) = 0 + \dy dx / dy dy dx dx + + Solving the above mentioned PDE is not trivial, and can be solved only by + making intelligent assumptions for `\xi` and `\eta` (heuristics). Once an + infinitesimal is found, the attempt to find more heuristics stops. This is done to + optimise the speed of solving the differential equation. If a list of all the + infinitesimals is needed, ``hint`` should be flagged as ``all``, which gives + the complete list of infinitesimals. If the infinitesimals for a particular + heuristic needs to be found, it can be passed as a flag to ``hint``. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.solvers.ode.lie_group import infinitesimals + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = f(x).diff(x) - x**2*f(x) + >>> infinitesimals(eq) + [{eta(x, f(x)): exp(x**3/3), xi(x, f(x)): 0}] + + References + ========== + + - Solving differential equations by Symmetry Groups, + John Starrett, pp. 1 - pp. 14 + + """ + + if isinstance(eq, Equality): + eq = eq.lhs - eq.rhs + if not func: + eq, func = _preprocess(eq) + variables = func.args + if len(variables) != 1: + raise ValueError("ODE's have only one independent variable") + else: + x = variables[0] + if not order: + order = ode_order(eq, func) + if order != 1: + raise NotImplementedError("Infinitesimals for only " + "first order ODE's have been implemented") + else: + df = func.diff(x) + # Matching differential equation of the form a*df + b + a = Wild('a', exclude = [df]) + b = Wild('b', exclude = [df]) + if match: # Used by lie_group hint + h = match['h'] + y = match['y'] + else: + match = collect(expand(eq), df).match(a*df + b) + if match: + h = -simplify(match[b]/match[a]) + else: + try: + sol = solve(eq, df) + except NotImplementedError: + raise NotImplementedError("Infinitesimals for the " + "first order ODE could not be found") + else: + h = sol[0] # Find infinitesimals for one solution + y = Dummy("y") + h = h.subs(func, y) + + u = Dummy("u") + hx = h.diff(x) + hy = h.diff(y) + hinv = ((1/h).subs([(x, u), (y, x)])).subs(u, y) # Inverse ODE + match = {'h': h, 'func': func, 'hx': hx, 'hy': hy, 'y': y, 'hinv': hinv} + if hint == 'all': + xieta = [] + for heuristic in lie_heuristics: + function = globals()['lie_heuristic_' + heuristic] + inflist = function(match, comp=True) + if inflist: + xieta.extend([inf for inf in inflist if inf not in xieta]) + if xieta: + return xieta + else: + raise NotImplementedError("Infinitesimals could not be found for " + "the given ODE") + + elif hint == 'default': + for heuristic in lie_heuristics: + function = globals()['lie_heuristic_' + heuristic] + xieta = function(match, comp=False) + if xieta: + return xieta + + raise NotImplementedError("Infinitesimals could not be found for" + " the given ODE") + + elif hint not in lie_heuristics: + raise ValueError("Heuristic not recognized: " + hint) + + else: + function = globals()['lie_heuristic_' + hint] + xieta = function(match, comp=True) + if xieta: + return xieta + else: + raise ValueError("Infinitesimals could not be found using the" + " given heuristic") + + +def lie_heuristic_abaco1_simple(match, comp=False): + r""" + The first heuristic uses the following four sets of + assumptions on `\xi` and `\eta` + + .. math:: \xi = 0, \eta = f(x) + + .. math:: \xi = 0, \eta = f(y) + + .. math:: \xi = f(x), \eta = 0 + + .. math:: \xi = f(y), \eta = 0 + + The success of this heuristic is determined by algebraic factorisation. + For the first assumption `\xi = 0` and `\eta` to be a function of `x`, the PDE + + .. math:: \frac{\partial \eta}{\partial x} + (\frac{\partial \eta}{\partial y} + - \frac{\partial \xi}{\partial x})*h + - \frac{\partial \xi}{\partial y}*h^{2} + - \xi*\frac{\partial h}{\partial x} - \eta*\frac{\partial h}{\partial y} = 0 + + reduces to `f'(x) - f\frac{\partial h}{\partial y} = 0` + If `\frac{\partial h}{\partial y}` is a function of `x`, then this can usually + be integrated easily. A similar idea is applied to the other 3 assumptions as well. + + + References + ========== + + - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra + Solving of First Order ODEs Using Symmetry Methods, pp. 8 + + + """ + + xieta = [] + y = match['y'] + h = match['h'] + func = match['func'] + x = func.args[0] + hx = match['hx'] + hy = match['hy'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + hysym = hy.free_symbols + if y not in hysym: + try: + fx = exp(integrate(hy, x)) + except NotImplementedError: + pass + else: + inf = {xi: S.Zero, eta: fx} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + factor = hy/h + facsym = factor.free_symbols + if x not in facsym: + try: + fy = exp(integrate(factor, y)) + except NotImplementedError: + pass + else: + inf = {xi: S.Zero, eta: fy.subs(y, func)} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + factor = -hx/h + facsym = factor.free_symbols + if y not in facsym: + try: + fx = exp(integrate(factor, x)) + except NotImplementedError: + pass + else: + inf = {xi: fx, eta: S.Zero} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + factor = -hx/(h**2) + facsym = factor.free_symbols + if x not in facsym: + try: + fy = exp(integrate(factor, y)) + except NotImplementedError: + pass + else: + inf = {xi: fy.subs(y, func), eta: S.Zero} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + if xieta: + return xieta + +def lie_heuristic_abaco1_product(match, comp=False): + r""" + The second heuristic uses the following two assumptions on `\xi` and `\eta` + + .. math:: \eta = 0, \xi = f(x)*g(y) + + .. math:: \eta = f(x)*g(y), \xi = 0 + + The first assumption of this heuristic holds good if + `\frac{1}{h^{2}}\frac{\partial^2}{\partial x \partial y}\log(h)` is + separable in `x` and `y`, then the separated factors containing `x` + is `f(x)`, and `g(y)` is obtained by + + .. math:: e^{\int f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)\,dy} + + provided `f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)` is a function + of `y` only. + + The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as + `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption + satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again + interchanged, to get `\eta` as `f(x)*g(y)` + + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 7 - pp. 8 + + """ + + xieta = [] + y = match['y'] + h = match['h'] + hinv = match['hinv'] + func = match['func'] + x = func.args[0] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + + inf = separatevars(((log(h).diff(y)).diff(x))/h**2, dict=True, symbols=[x, y]) + if inf and inf['coeff']: + fx = inf[x] + gy = simplify(fx*((1/(fx*h)).diff(x))) + gysyms = gy.free_symbols + if x not in gysyms: + gy = exp(integrate(gy, y)) + inf = {eta: S.Zero, xi: (fx*gy).subs(y, func)} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + u1 = Dummy("u1") + inf = separatevars(((log(hinv).diff(y)).diff(x))/hinv**2, dict=True, symbols=[x, y]) + if inf and inf['coeff']: + fx = inf[x] + gy = simplify(fx*((1/(fx*hinv)).diff(x))) + gysyms = gy.free_symbols + if x not in gysyms: + gy = exp(integrate(gy, y)) + etaval = fx*gy + etaval = (etaval.subs([(x, u1), (y, x)])).subs(u1, y) + inf = {eta: etaval.subs(y, func), xi: S.Zero} + if not comp: + return [inf] + if comp and inf not in xieta: + xieta.append(inf) + + if xieta: + return xieta + +def lie_heuristic_bivariate(match, comp=False): + r""" + The third heuristic assumes the infinitesimals `\xi` and `\eta` + to be bi-variate polynomials in `x` and `y`. The assumption made here + for the logic below is that `h` is a rational function in `x` and `y` + though that may not be necessary for the infinitesimals to be + bivariate polynomials. The coefficients of the infinitesimals + are found out by substituting them in the PDE and grouping similar terms + that are polynomials and since they form a linear system, solve and check + for non trivial solutions. The degree of the assumed bivariates + are increased till a certain maximum value. + + References + ========== + - Lie Groups and Differential Equations + pp. 327 - pp. 329 + + """ + + h = match['h'] + hx = match['hx'] + hy = match['hy'] + func = match['func'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + if h.is_rational_function(): + # The maximum degree that the infinitesimals can take is + # calculated by this technique. + etax, etay, etad, xix, xiy, xid = symbols("etax etay etad xix xiy xid") + ipde = etax + (etay - xix)*h - xiy*h**2 - xid*hx - etad*hy + num, denom = cancel(ipde).as_numer_denom() + deg = Poly(num, x, y).total_degree() + deta = Function('deta')(x, y) + dxi = Function('dxi')(x, y) + ipde = (deta.diff(x) + (deta.diff(y) - dxi.diff(x))*h - (dxi.diff(y))*h**2 + - dxi*hx - deta*hy) + xieq = Symbol("xi0") + etaeq = Symbol("eta0") + + for i in range(deg + 1): + if i: + xieq += Add(*[ + Symbol("xi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) + for power in range(i + 1)]) + etaeq += Add(*[ + Symbol("eta_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) + for power in range(i + 1)]) + pden, denom = (ipde.subs({dxi: xieq, deta: etaeq}).doit()).as_numer_denom() + pden = expand(pden) + + # If the individual terms are monomials, the coefficients + # are grouped + if pden.is_polynomial(x, y) and pden.is_Add: + polyy = Poly(pden, x, y).as_dict() + if polyy: + symset = xieq.free_symbols.union(etaeq.free_symbols) - {x, y} + soldict = solve(polyy.values(), *symset) + if isinstance(soldict, list): + soldict = soldict[0] + if any(soldict.values()): + xired = xieq.subs(soldict) + etared = etaeq.subs(soldict) + # Scaling is done by substituting one for the parameters + # This can be any number except zero. + dict_ = dict.fromkeys(symset, 1) + inf = {eta: etared.subs(dict_).subs(y, func), + xi: xired.subs(dict_).subs(y, func)} + return [inf] + +def lie_heuristic_chi(match, comp=False): + r""" + The aim of the fourth heuristic is to find the function `\chi(x, y)` + that satisfies the PDE `\frac{d\chi}{dx} + h\frac{d\chi}{dx} + - \frac{\partial h}{\partial y}\chi = 0`. + + This assumes `\chi` to be a bivariate polynomial in `x` and `y`. By intuition, + `h` should be a rational function in `x` and `y`. The method used here is + to substitute a general binomial for `\chi` up to a certain maximum degree + is reached. The coefficients of the polynomials, are calculated by by collecting + terms of the same order in `x` and `y`. + + After finding `\chi`, the next step is to use `\eta = \xi*h + \chi`, to + determine `\xi` and `\eta`. This can be done by dividing `\chi` by `h` + which would give `-\xi` as the quotient and `\eta` as the remainder. + + + References + ========== + - E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra + Solving of First Order ODEs Using Symmetry Methods, pp. 8 + + """ + + h = match['h'] + hy = match['hy'] + func = match['func'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + if h.is_rational_function(): + schi, schix, schiy = symbols("schi, schix, schiy") + cpde = schix + h*schiy - hy*schi + num, denom = cancel(cpde).as_numer_denom() + deg = Poly(num, x, y).total_degree() + + chi = Function('chi')(x, y) + chix = chi.diff(x) + chiy = chi.diff(y) + cpde = chix + h*chiy - hy*chi + chieq = Symbol("chi") + for i in range(1, deg + 1): + chieq += Add(*[ + Symbol("chi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power) + for power in range(i + 1)]) + cnum, cden = cancel(cpde.subs({chi : chieq}).doit()).as_numer_denom() + cnum = expand(cnum) + if cnum.is_polynomial(x, y) and cnum.is_Add: + cpoly = Poly(cnum, x, y).as_dict() + if cpoly: + solsyms = chieq.free_symbols - {x, y} + soldict = solve(cpoly.values(), *solsyms) + if isinstance(soldict, list): + soldict = soldict[0] + if any(soldict.values()): + chieq = chieq.subs(soldict) + dict_ = dict.fromkeys(solsyms, 1) + chieq = chieq.subs(dict_) + # After finding chi, the main aim is to find out + # eta, xi by the equation eta = xi*h + chi + # One method to set xi, would be rearranging it to + # (eta/h) - xi = (chi/h). This would mean dividing + # chi by h would give -xi as the quotient and eta + # as the remainder. Thanks to Sean Vig for suggesting + # this method. + xic, etac = div(chieq, h) + inf = {eta: etac.subs(y, func), xi: -xic.subs(y, func)} + return [inf] + +def lie_heuristic_function_sum(match, comp=False): + r""" + This heuristic uses the following two assumptions on `\xi` and `\eta` + + .. math:: \eta = 0, \xi = f(x) + g(y) + + .. math:: \eta = f(x) + g(y), \xi = 0 + + The first assumption of this heuristic holds good if + + .. math:: \frac{\partial}{\partial y}[(h\frac{\partial^{2}}{ + \partial x^{2}}(h^{-1}))^{-1}] + + is separable in `x` and `y`, + + 1. The separated factors containing `y` is `\frac{\partial g}{\partial y}`. + From this `g(y)` can be determined. + 2. The separated factors containing `x` is `f''(x)`. + 3. `h\frac{\partial^{2}}{\partial x^{2}}(h^{-1})` equals + `\frac{f''(x)}{f(x) + g(y)}`. From this `f(x)` can be determined. + + The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as + `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first + assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates + are again interchanged, to get `\eta` as `f(x) + g(y)`. + + For both assumptions, the constant factors are separated among `g(y)` + and `f''(x)`, such that `f''(x)` obtained from 3] is the same as that + obtained from 2]. If not possible, then this heuristic fails. + + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 7 - pp. 8 + + """ + + xieta = [] + h = match['h'] + func = match['func'] + hinv = match['hinv'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + for odefac in [h, hinv]: + factor = odefac*((1/odefac).diff(x, 2)) + sep = separatevars((1/factor).diff(y), dict=True, symbols=[x, y]) + if sep and sep['coeff'] and sep[x].has(x) and sep[y].has(y): + k = Dummy("k") + try: + gy = k*integrate(sep[y], y) + except NotImplementedError: + pass + else: + fdd = 1/(k*sep[x]*sep['coeff']) + fx = simplify(fdd/factor - gy) + check = simplify(fx.diff(x, 2) - fdd) + if fx: + if not check: + fx = fx.subs(k, 1) + gy = (gy/k) + else: + sol = solve(check, k) + if sol: + sol = sol[0] + fx = fx.subs(k, sol) + gy = (gy/k)*sol + else: + continue + if odefac == hinv: # Inverse ODE + fx = fx.subs(x, y) + gy = gy.subs(y, x) + etaval = factor_terms(fx + gy) + if etaval.is_Mul: + etaval = Mul(*[arg for arg in etaval.args if arg.has(x, y)]) + if odefac == hinv: # Inverse ODE + inf = {eta: etaval.subs(y, func), xi : S.Zero} + else: + inf = {xi: etaval.subs(y, func), eta : S.Zero} + if not comp: + return [inf] + else: + xieta.append(inf) + + if xieta: + return xieta + +def lie_heuristic_abaco2_similar(match, comp=False): + r""" + This heuristic uses the following two assumptions on `\xi` and `\eta` + + .. math:: \eta = g(x), \xi = f(x) + + .. math:: \eta = f(y), \xi = g(y) + + For the first assumption, + + 1. First `\frac{\frac{\partial h}{\partial y}}{\frac{\partial^{2} h}{ + \partial yy}}` is calculated. Let us say this value is A + + 2. If this is constant, then `h` is matched to the form `A(x) + B(x)e^{ + \frac{y}{C}}` then, `\frac{e^{\int \frac{A(x)}{C} \,dx}}{B(x)}` gives `f(x)` + and `A(x)*f(x)` gives `g(x)` + + 3. Otherwise `\frac{\frac{\partial A}{\partial X}}{\frac{\partial A}{ + \partial Y}} = \gamma` is calculated. If + + a] `\gamma` is a function of `x` alone + + b] `\frac{\gamma\frac{\partial h}{\partial y} - \gamma'(x) - \frac{ + \partial h}{\partial x}}{h + \gamma} = G` is a function of `x` alone. + then, `e^{\int G \,dx}` gives `f(x)` and `-\gamma*f(x)` gives `g(x)` + + The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as + `\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption + satisfies. After obtaining `f(x)` and `g(x)`, the coordinates are again + interchanged, to get `\xi` as `f(x^*)` and `\eta` as `g(y^*)` + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 10 - pp. 12 + + """ + + h = match['h'] + hx = match['hx'] + hy = match['hy'] + func = match['func'] + hinv = match['hinv'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + factor = cancel(h.diff(y)/h.diff(y, 2)) + factorx = factor.diff(x) + factory = factor.diff(y) + if not factor.has(x) and not factor.has(y): + A = Wild('A', exclude=[y]) + B = Wild('B', exclude=[y]) + C = Wild('C', exclude=[x, y]) + match = h.match(A + B*exp(y/C)) + try: + tau = exp(-integrate(match[A]/match[C]), x)/match[B] + except NotImplementedError: + pass + else: + gx = match[A]*tau + return [{xi: tau, eta: gx}] + + else: + gamma = cancel(factorx/factory) + if not gamma.has(y): + tauint = cancel((gamma*hy - gamma.diff(x) - hx)/(h + gamma)) + if not tauint.has(y): + try: + tau = exp(integrate(tauint, x)) + except NotImplementedError: + pass + else: + gx = -tau*gamma + return [{xi: tau, eta: gx}] + + factor = cancel(hinv.diff(y)/hinv.diff(y, 2)) + factorx = factor.diff(x) + factory = factor.diff(y) + if not factor.has(x) and not factor.has(y): + A = Wild('A', exclude=[y]) + B = Wild('B', exclude=[y]) + C = Wild('C', exclude=[x, y]) + match = h.match(A + B*exp(y/C)) + try: + tau = exp(-integrate(match[A]/match[C]), x)/match[B] + except NotImplementedError: + pass + else: + gx = match[A]*tau + return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] + + else: + gamma = cancel(factorx/factory) + if not gamma.has(y): + tauint = cancel((gamma*hinv.diff(y) - gamma.diff(x) - hinv.diff(x))/( + hinv + gamma)) + if not tauint.has(y): + try: + tau = exp(integrate(tauint, x)) + except NotImplementedError: + pass + else: + gx = -tau*gamma + return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}] + + +def lie_heuristic_abaco2_unique_unknown(match, comp=False): + r""" + This heuristic assumes the presence of unknown functions or known functions + with non-integer powers. + + 1. A list of all functions and non-integer powers containing x and y + 2. Loop over each element `f` in the list, find `\frac{\frac{\partial f}{\partial x}}{ + \frac{\partial f}{\partial x}} = R` + + If it is separable in `x` and `y`, let `X` be the factors containing `x`. Then + + a] Check if `\xi = X` and `\eta = -\frac{X}{R}` satisfy the PDE. If yes, then return + `\xi` and `\eta` + b] Check if `\xi = \frac{-R}{X}` and `\eta = -\frac{1}{X}` satisfy the PDE. + If yes, then return `\xi` and `\eta` + + If not, then check if + + a] :math:`\xi = -R,\eta = 1` + + b] :math:`\xi = 1, \eta = -\frac{1}{R}` + + are solutions. + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 10 - pp. 12 + + """ + + h = match['h'] + hx = match['hx'] + hy = match['hy'] + func = match['func'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + funclist = [] + for atom in h.atoms(Pow): + base, exp = atom.as_base_exp() + if base.has(x) and base.has(y): + if not exp.is_Integer: + funclist.append(atom) + + for function in h.atoms(AppliedUndef): + syms = function.free_symbols + if x in syms and y in syms: + funclist.append(function) + + for f in funclist: + frac = cancel(f.diff(y)/f.diff(x)) + sep = separatevars(frac, dict=True, symbols=[x, y]) + if sep and sep['coeff']: + xitry1 = sep[x] + etatry1 = -1/(sep[y]*sep['coeff']) + pde1 = etatry1.diff(y)*h - xitry1.diff(x)*h - xitry1*hx - etatry1*hy + if not simplify(pde1): + return [{xi: xitry1, eta: etatry1.subs(y, func)}] + xitry2 = 1/etatry1 + etatry2 = 1/xitry1 + pde2 = etatry2.diff(x) - (xitry2.diff(y))*h**2 - xitry2*hx - etatry2*hy + if not simplify(expand(pde2)): + return [{xi: xitry2.subs(y, func), eta: etatry2}] + + else: + etatry = -1/frac + pde = etatry.diff(x) + etatry.diff(y)*h - hx - etatry*hy + if not simplify(pde): + return [{xi: S.One, eta: etatry.subs(y, func)}] + xitry = -frac + pde = -xitry.diff(x)*h -xitry.diff(y)*h**2 - xitry*hx -hy + if not simplify(expand(pde)): + return [{xi: xitry.subs(y, func), eta: S.One}] + + +def lie_heuristic_abaco2_unique_general(match, comp=False): + r""" + This heuristic finds if infinitesimals of the form `\eta = f(x)`, `\xi = g(y)` + without making any assumptions on `h`. + + The complete sequence of steps is given in the paper mentioned below. + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 10 - pp. 12 + + """ + hx = match['hx'] + hy = match['hy'] + func = match['func'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + A = hx.diff(y) + B = hy.diff(y) + hy**2 + C = hx.diff(x) - hx**2 + + if not (A and B and C): + return + + Ax = A.diff(x) + Ay = A.diff(y) + Axy = Ax.diff(y) + Axx = Ax.diff(x) + Ayy = Ay.diff(y) + D = simplify(2*Axy + hx*Ay - Ax*hy + (hx*hy + 2*A)*A)*A - 3*Ax*Ay + if not D: + E1 = simplify(3*Ax**2 + ((hx**2 + 2*C)*A - 2*Axx)*A) + if E1: + E2 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2) + if not E2: + E3 = simplify( + E1*((28*Ax + 4*hx*A)*A**3 - E1*(hy*A + Ay)) - E1.diff(x)*8*A**4) + if not E3: + etaval = cancel((4*A**3*(Ax - hx*A) + E1*(hy*A - Ay))/(S(2)*A*E1)) + if x not in etaval: + try: + etaval = exp(integrate(etaval, y)) + except NotImplementedError: + pass + else: + xival = -4*A**3*etaval/E1 + if y not in xival: + return [{xi: xival, eta: etaval.subs(y, func)}] + + else: + E1 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2) + if E1: + E2 = simplify( + 4*A**3*D - D**2 + E1*((2*Axx - (hx**2 + 2*C)*A)*A - 3*Ax**2)) + if not E2: + E3 = simplify( + -(A*D)*E1.diff(y) + ((E1.diff(x) - hy*D)*A + 3*Ay*D + + (A*hx - 3*Ax)*E1)*E1) + if not E3: + etaval = cancel(((A*hx - Ax)*E1 - (Ay + A*hy)*D)/(S(2)*A*D)) + if x not in etaval: + try: + etaval = exp(integrate(etaval, y)) + except NotImplementedError: + pass + else: + xival = -E1*etaval/D + if y not in xival: + return [{xi: xival, eta: etaval.subs(y, func)}] + + +def lie_heuristic_linear(match, comp=False): + r""" + This heuristic assumes + + 1. `\xi = ax + by + c` and + 2. `\eta = fx + gy + h` + + After substituting the following assumptions in the determining PDE, it + reduces to + + .. math:: f + (g - a)h - bh^{2} - (ax + by + c)\frac{\partial h}{\partial x} + - (fx + gy + c)\frac{\partial h}{\partial y} + + Solving the reduced PDE obtained, using the method of characteristics, becomes + impractical. The method followed is grouping similar terms and solving the system + of linear equations obtained. The difference between the bivariate heuristic is that + `h` need not be a rational function in this case. + + References + ========== + - E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order + ODE Patterns, pp. 10 - pp. 12 + + """ + h = match['h'] + hx = match['hx'] + hy = match['hy'] + func = match['func'] + x = func.args[0] + y = match['y'] + xi = Function('xi')(x, func) + eta = Function('eta')(x, func) + + coeffdict = {} + symbols = numbered_symbols("c", cls=Dummy) + symlist = [next(symbols) for _ in islice(symbols, 6)] + C0, C1, C2, C3, C4, C5 = symlist + pde = C3 + (C4 - C0)*h - (C0*x + C1*y + C2)*hx - (C3*x + C4*y + C5)*hy - C1*h**2 + pde, denom = pde.as_numer_denom() + pde = powsimp(expand(pde)) + if pde.is_Add: + terms = pde.args + for term in terms: + if term.is_Mul: + rem = Mul(*[m for m in term.args if not m.has(x, y)]) + xypart = term/rem + if xypart not in coeffdict: + coeffdict[xypart] = rem + else: + coeffdict[xypart] += rem + else: + if term not in coeffdict: + coeffdict[term] = S.One + else: + coeffdict[term] += S.One + + sollist = coeffdict.values() + soldict = solve(sollist, symlist) + if soldict: + if isinstance(soldict, list): + soldict = soldict[0] + subval = soldict.values() + if any(t for t in subval): + onedict = dict(zip(symlist, [1]*6)) + xival = C0*x + C1*func + C2 + etaval = C3*x + C4*func + C5 + xival = xival.subs(soldict) + etaval = etaval.subs(soldict) + xival = xival.subs(onedict) + etaval = etaval.subs(onedict) + return [{xi: xival, eta: etaval}] + + +def _lie_group_remove(coords): + r""" + This function is strictly meant for internal use by the Lie group ODE solving + method. It replaces arbitrary functions returned by pdsolve as follows: + + 1] If coords is an arbitrary function, then its argument is returned. + 2] An arbitrary function in an Add object is replaced by zero. + 3] An arbitrary function in a Mul object is replaced by one. + 4] If there is no arbitrary function coords is returned unchanged. + + Examples + ======== + + >>> from sympy.solvers.ode.lie_group import _lie_group_remove + >>> from sympy import Function + >>> from sympy.abc import x, y + >>> F = Function("F") + >>> eq = x**2*y + >>> _lie_group_remove(eq) + x**2*y + >>> eq = F(x**2*y) + >>> _lie_group_remove(eq) + x**2*y + >>> eq = x*y**2 + F(x**3) + >>> _lie_group_remove(eq) + x*y**2 + >>> eq = (F(x**3) + y)*x**4 + >>> _lie_group_remove(eq) + x**4*y + + """ + if isinstance(coords, AppliedUndef): + return coords.args[0] + elif coords.is_Add: + subfunc = coords.atoms(AppliedUndef) + if subfunc: + for func in subfunc: + coords = coords.subs(func, 0) + return coords + elif coords.is_Pow: + base, expr = coords.as_base_exp() + base = _lie_group_remove(base) + expr = _lie_group_remove(expr) + return base**expr + elif coords.is_Mul: + mulargs = [] + coordargs = coords.args + for arg in coordargs: + if not isinstance(coords, AppliedUndef): + mulargs.append(_lie_group_remove(arg)) + return Mul(*mulargs) + return coords diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/nonhomogeneous.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/nonhomogeneous.py new file mode 100644 index 0000000000000000000000000000000000000000..ae39d55664e4850168ca7d68f65cf02171979957 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/nonhomogeneous.py @@ -0,0 +1,484 @@ +r""" +This File contains helper functions for nth_linear_constant_coeff_undetermined_coefficients, +nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients, +nth_linear_constant_coeff_variation_of_parameters, +and nth_linear_euler_eq_nonhomogeneous_variation_of_parameters. + +All the functions in this file are used by more than one solvers so, instead of creating +instances in other classes for using them it is better to keep it here as separate helpers. + +""" +from collections import Counter +from sympy.core import Add, S +from sympy.core.function import diff, expand, _mexpand, expand_mul +from sympy.core.relational import Eq +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Dummy, Wild +from sympy.functions import exp, cos, cosh, im, log, re, sin, sinh, \ + atan2, conjugate +from sympy.integrals import Integral +from sympy.polys import (Poly, RootOf, rootof, roots) +from sympy.simplify import collect, simplify, separatevars, powsimp, trigsimp # type: ignore +from sympy.utilities import numbered_symbols +from sympy.solvers.solvers import solve +from sympy.matrices import wronskian +from .subscheck import sub_func_doit +from sympy.solvers.ode.ode import get_numbered_constants + + +def _test_term(coeff, func, order): + r""" + Linear Euler ODEs have the form K*x**order*diff(y(x), x, order) = F(x), + where K is independent of x and y(x), order>= 0. + So we need to check that for each term, coeff == K*x**order from + some K. We have a few cases, since coeff may have several + different types. + """ + x = func.args[0] + f = func.func + if order < 0: + raise ValueError("order should be greater than 0") + if coeff == 0: + return True + if order == 0: + if x in coeff.free_symbols: + return False + return True + if coeff.is_Mul: + if coeff.has(f(x)): + return False + return x**order in coeff.args + elif coeff.is_Pow: + return coeff.as_base_exp() == (x, order) + elif order == 1: + return x == coeff + return False + + +def _get_euler_characteristic_eq_sols(eq, func, match_obj): + r""" + Returns the solution of homogeneous part of the linear euler ODE and + the list of roots of characteristic equation. + + The parameter ``match_obj`` is a dict of order:coeff terms, where order is the order + of the derivative on each term, and coeff is the coefficient of that derivative. + + """ + x = func.args[0] + f = func.func + + # First, set up characteristic equation. + chareq, symbol = S.Zero, Dummy('x') + + for i in match_obj: + if i >= 0: + chareq += (match_obj[i]*diff(x**symbol, x, i)*x**-symbol).expand() + + chareq = Poly(chareq, symbol) + chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] + collectterms = [] + + # A generator of constants + constants = list(get_numbered_constants(eq, num=chareq.degree()*2)) + constants.reverse() + + # Create a dict root: multiplicity or charroots + charroots = Counter(chareqroots) + gsol = S.Zero + ln = log + for root, multiplicity in charroots.items(): + for i in range(multiplicity): + if isinstance(root, RootOf): + gsol += (x**root) * constants.pop() + if multiplicity != 1: + raise ValueError("Value should be 1") + collectterms = [(0, root, 0)] + collectterms + elif root.is_real: + gsol += ln(x)**i*(x**root) * constants.pop() + collectterms = [(i, root, 0)] + collectterms + else: + reroot = re(root) + imroot = im(root) + gsol += ln(x)**i * (x**reroot) * ( + constants.pop() * sin(abs(imroot)*ln(x)) + + constants.pop() * cos(imroot*ln(x))) + collectterms = [(i, reroot, imroot)] + collectterms + + gsol = Eq(f(x), gsol) + + gensols = [] + # Keep track of when to use sin or cos for nonzero imroot + for i, reroot, imroot in collectterms: + if imroot == 0: + gensols.append(ln(x)**i*x**reroot) + else: + sin_form = ln(x)**i*x**reroot*sin(abs(imroot)*ln(x)) + if sin_form in gensols: + cos_form = ln(x)**i*x**reroot*cos(imroot*ln(x)) + gensols.append(cos_form) + else: + gensols.append(sin_form) + return gsol, gensols + + +def _solve_variation_of_parameters(eq, func, roots, homogen_sol, order, match_obj, simplify_flag=True): + r""" + Helper function for the method of variation of parameters and nonhomogeneous euler eq. + + See the + :py:meth:`~sympy.solvers.ode.single.NthLinearConstantCoeffVariationOfParameters` + docstring for more information on this method. + + The parameter are ``match_obj`` should be a dictionary that has the following + keys: + + ``list`` + A list of solutions to the homogeneous equation. + + ``sol`` + The general solution. + + """ + f = func.func + x = func.args[0] + r = match_obj + psol = 0 + wr = wronskian(roots, x) + + if simplify_flag: + wr = simplify(wr) # We need much better simplification for + # some ODEs. See issue 4662, for example. + # To reduce commonly occurring sin(x)**2 + cos(x)**2 to 1 + wr = trigsimp(wr, deep=True, recursive=True) + if not wr: + # The wronskian will be 0 iff the solutions are not linearly + # independent. + raise NotImplementedError("Cannot find " + str(order) + + " solutions to the homogeneous equation necessary to apply " + + "variation of parameters to " + str(eq) + " (Wronskian == 0)") + if len(roots) != order: + raise NotImplementedError("Cannot find " + str(order) + + " solutions to the homogeneous equation necessary to apply " + + "variation of parameters to " + + str(eq) + " (number of terms != order)") + negoneterm = S.NegativeOne**(order) + for i in roots: + psol += negoneterm*Integral(wronskian([sol for sol in roots if sol != i], x)*r[-1]/wr, x)*i/r[order] + negoneterm *= -1 + + if simplify_flag: + psol = simplify(psol) + psol = trigsimp(psol, deep=True) + return Eq(f(x), homogen_sol.rhs + psol) + + +def _get_const_characteristic_eq_sols(r, func, order): + r""" + Returns the roots of characteristic equation of constant coefficient + linear ODE and list of collectterms which is later on used by simplification + to use collect on solution. + + The parameter `r` is a dict of order:coeff terms, where order is the order of the + derivative on each term, and coeff is the coefficient of that derivative. + + """ + x = func.args[0] + # First, set up characteristic equation. + chareq, symbol = S.Zero, Dummy('x') + + for i in r.keys(): + if isinstance(i, str) or i < 0: + pass + else: + chareq += r[i]*symbol**i + + chareq = Poly(chareq, symbol) + # Can't just call roots because it doesn't return rootof for unsolveable + # polynomials. + chareqroots = roots(chareq, multiple=True) + if len(chareqroots) != order: + chareqroots = [rootof(chareq, k) for k in range(chareq.degree())] + + chareq_is_complex = not all(i.is_real for i in chareq.all_coeffs()) + + # Create a dict root: multiplicity or charroots + charroots = Counter(chareqroots) + # We need to keep track of terms so we can run collect() at the end. + # This is necessary for constantsimp to work properly. + collectterms = [] + gensols = [] + conjugate_roots = [] # used to prevent double-use of conjugate roots + # Loop over roots in theorder provided by roots/rootof... + for root in chareqroots: + # but don't repoeat multiple roots. + if root not in charroots: + continue + multiplicity = charroots.pop(root) + for i in range(multiplicity): + if chareq_is_complex: + gensols.append(x**i*exp(root*x)) + collectterms = [(i, root, 0)] + collectterms + continue + reroot = re(root) + imroot = im(root) + if imroot.has(atan2) and reroot.has(atan2): + # Remove this condition when re and im stop returning + # circular atan2 usages. + gensols.append(x**i*exp(root*x)) + collectterms = [(i, root, 0)] + collectterms + else: + if root in conjugate_roots: + collectterms = [(i, reroot, imroot)] + collectterms + continue + if imroot == 0: + gensols.append(x**i*exp(reroot*x)) + collectterms = [(i, reroot, 0)] + collectterms + continue + conjugate_roots.append(conjugate(root)) + gensols.append(x**i*exp(reroot*x) * sin(abs(imroot) * x)) + gensols.append(x**i*exp(reroot*x) * cos( imroot * x)) + + # This ordering is important + collectterms = [(i, reroot, imroot)] + collectterms + return gensols, collectterms + + +# Ideally these kind of simplification functions shouldn't be part of solvers. +# odesimp should be improved to handle these kind of specific simplifications. +def _get_simplified_sol(sol, func, collectterms): + r""" + Helper function which collects the solution on + collectterms. Ideally this should be handled by odesimp.It is used + only when the simplify is set to True in dsolve. + + The parameter ``collectterms`` is a list of tuple (i, reroot, imroot) where `i` is + the multiplicity of the root, reroot is real part and imroot being the imaginary part. + + """ + f = func.func + x = func.args[0] + collectterms.sort(key=default_sort_key) + collectterms.reverse() + assert len(sol) == 1 and sol[0].lhs == f(x) + sol = sol[0].rhs + sol = expand_mul(sol) + for i, reroot, imroot in collectterms: + sol = collect(sol, x**i*exp(reroot*x)*sin(abs(imroot)*x)) + sol = collect(sol, x**i*exp(reroot*x)*cos(imroot*x)) + for i, reroot, imroot in collectterms: + sol = collect(sol, x**i*exp(reroot*x)) + sol = powsimp(sol) + return Eq(f(x), sol) + + +def _undetermined_coefficients_match(expr, x, func=None, eq_homogeneous=S.Zero): + r""" + Returns a trial function match if undetermined coefficients can be applied + to ``expr``, and ``None`` otherwise. + + A trial expression can be found for an expression for use with the method + of undetermined coefficients if the expression is an + additive/multiplicative combination of constants, polynomials in `x` (the + independent variable of expr), `\sin(a x + b)`, `\cos(a x + b)`, and + `e^{a x}` terms (in other words, it has a finite number of linearly + independent derivatives). + + Note that you may still need to multiply each term returned here by + sufficient `x` to make it linearly independent with the solutions to the + homogeneous equation. + + This is intended for internal use by ``undetermined_coefficients`` hints. + + SymPy currently has no way to convert `\sin^n(x) \cos^m(y)` into a sum of + only `\sin(a x)` and `\cos(b x)` terms, so these are not implemented. So, + for example, you will need to manually convert `\sin^2(x)` into `[1 + + \cos(2 x)]/2` to properly apply the method of undetermined coefficients on + it. + + Examples + ======== + + >>> from sympy import log, exp + >>> from sympy.solvers.ode.nonhomogeneous import _undetermined_coefficients_match + >>> from sympy.abc import x + >>> _undetermined_coefficients_match(9*x*exp(x) + exp(-x), x) + {'test': True, 'trialset': {x*exp(x), exp(-x), exp(x)}} + >>> _undetermined_coefficients_match(log(x), x) + {'test': False} + + """ + a = Wild('a', exclude=[x]) + b = Wild('b', exclude=[x]) + expr = powsimp(expr, combine='exp') # exp(x)*exp(2*x + 1) => exp(3*x + 1) + retdict = {} + + def _test_term(expr, x) -> bool: + r""" + Test if ``expr`` fits the proper form for undetermined coefficients. + """ + if not expr.has(x): + return True + if expr.is_Add: + return all(_test_term(i, x) for i in expr.args) + if expr.is_Mul: + if expr.has(sin, cos): + foundtrig = False + # Make sure that there is only one trig function in the args. + # See the docstring. + for i in expr.args: + if i.has(sin, cos): + if foundtrig: + return False + else: + foundtrig = True + return all(_test_term(i, x) for i in expr.args) + if expr.is_Function: + return expr.func in (sin, cos, exp, sinh, cosh) and \ + bool(expr.args[0].match(a*x + b)) + if expr.is_Pow and expr.base.is_Symbol and expr.exp.is_Integer and \ + expr.exp >= 0: + return True + if expr.is_Pow and expr.base.is_number: + return bool(expr.exp.match(a*x + b)) + return expr.is_Symbol or bool(expr.is_number) + + def _get_trial_set(expr, x, exprs=set()): + r""" + Returns a set of trial terms for undetermined coefficients. + + The idea behind undetermined coefficients is that the terms expression + repeat themselves after a finite number of derivatives, except for the + coefficients (they are linearly dependent). So if we collect these, + we should have the terms of our trial function. + """ + def _remove_coefficient(expr, x): + r""" + Returns the expression without a coefficient. + + Similar to expr.as_independent(x)[1], except it only works + multiplicatively. + """ + term = S.One + if expr.is_Mul: + for i in expr.args: + if i.has(x): + term *= i + elif expr.has(x): + term = expr + return term + + expr = expand_mul(expr) + if expr.is_Add: + for term in expr.args: + if _remove_coefficient(term, x) in exprs: + pass + else: + exprs.add(_remove_coefficient(term, x)) + exprs = exprs.union(_get_trial_set(term, x, exprs)) + else: + term = _remove_coefficient(expr, x) + tmpset = exprs.union({term}) + oldset = set() + while tmpset != oldset: + # If you get stuck in this loop, then _test_term is probably + # broken + oldset = tmpset.copy() + expr = expr.diff(x) + term = _remove_coefficient(expr, x) + if term.is_Add: + tmpset = tmpset.union(_get_trial_set(term, x, tmpset)) + else: + tmpset.add(term) + exprs = tmpset + return exprs + + def is_homogeneous_solution(term): + r""" This function checks whether the given trialset contains any root + of homogeneous equation""" + return expand(sub_func_doit(eq_homogeneous, func, term)).is_zero + + retdict['test'] = _test_term(expr, x) + if retdict['test']: + # Try to generate a list of trial solutions that will have the + # undetermined coefficients. Note that if any of these are not linearly + # independent with any of the solutions to the homogeneous equation, + # then they will need to be multiplied by sufficient x to make them so. + # This function DOES NOT do that (it doesn't even look at the + # homogeneous equation). + temp_set = set() + for i in Add.make_args(expr): + act = _get_trial_set(i, x) + if eq_homogeneous is not S.Zero: + while any(is_homogeneous_solution(ts) for ts in act): + act = {x*ts for ts in act} + temp_set = temp_set.union(act) + + retdict['trialset'] = temp_set + return retdict + + +def _solve_undetermined_coefficients(eq, func, order, match, trialset): + r""" + Helper function for the method of undetermined coefficients. + + See the + :py:meth:`~sympy.solvers.ode.single.NthLinearConstantCoeffUndeterminedCoefficients` + docstring for more information on this method. + + The parameter ``trialset`` is the set of trial functions as returned by + ``_undetermined_coefficients_match()['trialset']``. + + The parameter ``match`` should be a dictionary that has the following + keys: + + ``list`` + A list of solutions to the homogeneous equation. + + ``sol`` + The general solution. + + """ + r = match + coeffs = numbered_symbols('a', cls=Dummy) + coefflist = [] + gensols = r['list'] + gsol = r['sol'] + f = func.func + x = func.args[0] + + if len(gensols) != order: + raise NotImplementedError("Cannot find " + str(order) + + " solutions to the homogeneous equation necessary to apply" + + " undetermined coefficients to " + str(eq) + + " (number of terms != order)") + + trialfunc = 0 + for i in trialset: + c = next(coeffs) + coefflist.append(c) + trialfunc += c*i + + eqs = sub_func_doit(eq, f(x), trialfunc) + + coeffsdict = dict(list(zip(trialset, [0]*(len(trialset) + 1)))) + + eqs = _mexpand(eqs) + + for i in Add.make_args(eqs): + s = separatevars(i, dict=True, symbols=[x]) + if coeffsdict.get(s[x]): + coeffsdict[s[x]] += s['coeff'] + else: + coeffsdict[s[x]] = s['coeff'] + + coeffvals = solve(list(coeffsdict.values()), coefflist) + + if not coeffvals: + raise NotImplementedError( + "Could not solve `%s` using the " + "method of undetermined coefficients " + "(unable to solve for coefficients)." % eq) + + psol = trialfunc.subs(coeffvals) + + return Eq(f(x), gsol.rhs + psol) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/ode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/ode.py new file mode 100644 index 0000000000000000000000000000000000000000..6a28b2162b38a2dd8612c14e91fd588912f6756a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/ode.py @@ -0,0 +1,3572 @@ +r""" +This module contains :py:meth:`~sympy.solvers.ode.dsolve` and different helper +functions that it uses. + +:py:meth:`~sympy.solvers.ode.dsolve` solves ordinary differential equations. +See the docstring on the various functions for their uses. Note that partial +differential equations support is in ``pde.py``. Note that hint functions +have docstrings describing their various methods, but they are intended for +internal use. Use ``dsolve(ode, func, hint=hint)`` to solve an ODE using a +specific hint. See also the docstring on +:py:meth:`~sympy.solvers.ode.dsolve`. + +**Functions in this module** + + These are the user functions in this module: + + - :py:meth:`~sympy.solvers.ode.dsolve` - Solves ODEs. + - :py:meth:`~sympy.solvers.ode.classify_ode` - Classifies ODEs into + possible hints for :py:meth:`~sympy.solvers.ode.dsolve`. + - :py:meth:`~sympy.solvers.ode.checkodesol` - Checks if an equation is the + solution to an ODE. + - :py:meth:`~sympy.solvers.ode.homogeneous_order` - Returns the + homogeneous order of an expression. + - :py:meth:`~sympy.solvers.ode.infinitesimals` - Returns the infinitesimals + of the Lie group of point transformations of an ODE, such that it is + invariant. + - :py:meth:`~sympy.solvers.ode.checkinfsol` - Checks if the given infinitesimals + are the actual infinitesimals of a first order ODE. + + These are the non-solver helper functions that are for internal use. The + user should use the various options to + :py:meth:`~sympy.solvers.ode.dsolve` to obtain the functionality provided + by these functions: + + - :py:meth:`~sympy.solvers.ode.ode.odesimp` - Does all forms of ODE + simplification. + - :py:meth:`~sympy.solvers.ode.ode.ode_sol_simplicity` - A key function for + comparing solutions by simplicity. + - :py:meth:`~sympy.solvers.ode.constantsimp` - Simplifies arbitrary + constants. + - :py:meth:`~sympy.solvers.ode.ode.constant_renumber` - Renumber arbitrary + constants. + - :py:meth:`~sympy.solvers.ode.ode._handle_Integral` - Evaluate unevaluated + Integrals. + + See also the docstrings of these functions. + +**Currently implemented solver methods** + +The following methods are implemented for solving ordinary differential +equations. See the docstrings of the various hint functions for more +information on each (run ``help(ode)``): + + - 1st order separable differential equations. + - 1st order differential equations whose coefficients or `dx` and `dy` are + functions homogeneous of the same order. + - 1st order exact differential equations. + - 1st order linear differential equations. + - 1st order Bernoulli differential equations. + - Power series solutions for first order differential equations. + - Lie Group method of solving first order differential equations. + - 2nd order Liouville differential equations. + - Power series solutions for second order differential equations + at ordinary and regular singular points. + - `n`\th order differential equation that can be solved with algebraic + rearrangement and integration. + - `n`\th order linear homogeneous differential equation with constant + coefficients. + - `n`\th order linear inhomogeneous differential equation with constant + coefficients using the method of undetermined coefficients. + - `n`\th order linear inhomogeneous differential equation with constant + coefficients using the method of variation of parameters. + +**Philosophy behind this module** + +This module is designed to make it easy to add new ODE solving methods without +having to mess with the solving code for other methods. The idea is that +there is a :py:meth:`~sympy.solvers.ode.classify_ode` function, which takes in +an ODE and tells you what hints, if any, will solve the ODE. It does this +without attempting to solve the ODE, so it is fast. Each solving method is a +hint, and it has its own function, named ``ode_``. That function takes +in the ODE and any match expression gathered by +:py:meth:`~sympy.solvers.ode.classify_ode` and returns a solved result. If +this result has any integrals in it, the hint function will return an +unevaluated :py:class:`~sympy.integrals.integrals.Integral` class. +:py:meth:`~sympy.solvers.ode.dsolve`, which is the user wrapper function +around all of this, will then call :py:meth:`~sympy.solvers.ode.ode.odesimp` on +the result, which, among other things, will attempt to solve the equation for +the dependent variable (the function we are solving for), simplify the +arbitrary constants in the expression, and evaluate any integrals, if the hint +allows it. + +**How to add new solution methods** + +If you have an ODE that you want :py:meth:`~sympy.solvers.ode.dsolve` to be +able to solve, try to avoid adding special case code here. Instead, try +finding a general method that will solve your ODE, as well as others. This +way, the :py:mod:`~sympy.solvers.ode` module will become more robust, and +unhindered by special case hacks. WolphramAlpha and Maple's +DETools[odeadvisor] function are two resources you can use to classify a +specific ODE. It is also better for a method to work with an `n`\th order ODE +instead of only with specific orders, if possible. + +To add a new method, there are a few things that you need to do. First, you +need a hint name for your method. Try to name your hint so that it is +unambiguous with all other methods, including ones that may not be implemented +yet. If your method uses integrals, also include a ``hint_Integral`` hint. +If there is more than one way to solve ODEs with your method, include a hint +for each one, as well as a ``_best`` hint. Your ``ode__best()`` +function should choose the best using min with ``ode_sol_simplicity`` as the +key argument. See +:obj:`~sympy.solvers.ode.single.HomogeneousCoeffBest`, for example. +The function that uses your method will be called ``ode_()``, so the +hint must only use characters that are allowed in a Python function name +(alphanumeric characters and the underscore '``_``' character). Include a +function for every hint, except for ``_Integral`` hints +(:py:meth:`~sympy.solvers.ode.dsolve` takes care of those automatically). +Hint names should be all lowercase, unless a word is commonly capitalized +(such as Integral or Bernoulli). If you have a hint that you do not want to +run with ``all_Integral`` that does not have an ``_Integral`` counterpart (such +as a best hint that would defeat the purpose of ``all_Integral``), you will +need to remove it manually in the :py:meth:`~sympy.solvers.ode.dsolve` code. +See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for +guidelines on writing a hint name. + +Determine *in general* how the solutions returned by your method compare with +other methods that can potentially solve the same ODEs. Then, put your hints +in the :py:data:`~sympy.solvers.ode.allhints` tuple in the order that they +should be called. The ordering of this tuple determines which hints are +default. Note that exceptions are ok, because it is easy for the user to +choose individual hints with :py:meth:`~sympy.solvers.ode.dsolve`. In +general, ``_Integral`` variants should go at the end of the list, and +``_best`` variants should go before the various hints they apply to. For +example, the ``undetermined_coefficients`` hint comes before the +``variation_of_parameters`` hint because, even though variation of parameters +is more general than undetermined coefficients, undetermined coefficients +generally returns cleaner results for the ODEs that it can solve than +variation of parameters does, and it does not require integration, so it is +much faster. + +Next, you need to have a match expression or a function that matches the type +of the ODE, which you should put in :py:meth:`~sympy.solvers.ode.classify_ode` +(if the match function is more than just a few lines. It should match the +ODE without solving for it as much as possible, so that +:py:meth:`~sympy.solvers.ode.classify_ode` remains fast and is not hindered by +bugs in solving code. Be sure to consider corner cases. For example, if your +solution method involves dividing by something, make sure you exclude the case +where that division will be 0. + +In most cases, the matching of the ODE will also give you the various parts +that you need to solve it. You should put that in a dictionary (``.match()`` +will do this for you), and add that as ``matching_hints['hint'] = matchdict`` +in the relevant part of :py:meth:`~sympy.solvers.ode.classify_ode`. +:py:meth:`~sympy.solvers.ode.classify_ode` will then send this to +:py:meth:`~sympy.solvers.ode.dsolve`, which will send it to your function as +the ``match`` argument. Your function should be named ``ode_(eq, func, +order, match)`. If you need to send more information, put it in the ``match`` +dictionary. For example, if you had to substitute in a dummy variable in +:py:meth:`~sympy.solvers.ode.classify_ode` to match the ODE, you will need to +pass it to your function using the `match` dict to access it. You can access +the independent variable using ``func.args[0]``, and the dependent variable +(the function you are trying to solve for) as ``func.func``. If, while trying +to solve the ODE, you find that you cannot, raise ``NotImplementedError``. +:py:meth:`~sympy.solvers.ode.dsolve` will catch this error with the ``all`` +meta-hint, rather than causing the whole routine to fail. + +Add a docstring to your function that describes the method employed. Like +with anything else in SymPy, you will need to add a doctest to the docstring, +in addition to real tests in ``test_ode.py``. Try to maintain consistency +with the other hint functions' docstrings. Add your method to the list at the +top of this docstring. Also, add your method to ``ode.rst`` in the +``docs/src`` directory, so that the Sphinx docs will pull its docstring into +the main SymPy documentation. Be sure to make the Sphinx documentation by +running ``make html`` from within the doc directory to verify that the +docstring formats correctly. + +If your solution method involves integrating, use :py:obj:`~.Integral` instead of +:py:meth:`~sympy.core.expr.Expr.integrate`. This allows the user to bypass +hard/slow integration by using the ``_Integral`` variant of your hint. In +most cases, calling :py:meth:`sympy.core.basic.Basic.doit` will integrate your +solution. If this is not the case, you will need to write special code in +:py:meth:`~sympy.solvers.ode.ode._handle_Integral`. Arbitrary constants should be +symbols named ``C1``, ``C2``, and so on. All solution methods should return +an equality instance. If you need an arbitrary number of arbitrary constants, +you can use ``constants = numbered_symbols(prefix='C', cls=Symbol, start=1)``. +If it is possible to solve for the dependent function in a general way, do so. +Otherwise, do as best as you can, but do not call solve in your +``ode_()`` function. :py:meth:`~sympy.solvers.ode.ode.odesimp` will attempt +to solve the solution for you, so you do not need to do that. Lastly, if your +ODE has a common simplification that can be applied to your solutions, you can +add a special case in :py:meth:`~sympy.solvers.ode.ode.odesimp` for it. For +example, solutions returned from the ``1st_homogeneous_coeff`` hints often +have many :obj:`~sympy.functions.elementary.exponential.log` terms, so +:py:meth:`~sympy.solvers.ode.ode.odesimp` calls +:py:meth:`~sympy.simplify.simplify.logcombine` on them (it also helps to write +the arbitrary constant as ``log(C1)`` instead of ``C1`` in this case). Also +consider common ways that you can rearrange your solution to have +:py:meth:`~sympy.solvers.ode.constantsimp` take better advantage of it. It is +better to put simplification in :py:meth:`~sympy.solvers.ode.ode.odesimp` than in +your method, because it can then be turned off with the simplify flag in +:py:meth:`~sympy.solvers.ode.dsolve`. If you have any extraneous +simplification in your function, be sure to only run it using ``if +match.get('simplify', True):``, especially if it can be slow or if it can +reduce the domain of the solution. + +Finally, as with every contribution to SymPy, your method will need to be +tested. Add a test for each method in ``test_ode.py``. Follow the +conventions there, i.e., test the solver using ``dsolve(eq, f(x), +hint=your_hint)``, and also test the solution using +:py:meth:`~sympy.solvers.ode.checkodesol` (you can put these in a separate +tests and skip/XFAIL if it runs too slow/does not work). Be sure to call your +hint specifically in :py:meth:`~sympy.solvers.ode.dsolve`, that way the test +will not be broken simply by the introduction of another matching hint. If your +method works for higher order (>1) ODEs, you will need to run ``sol = +constant_renumber(sol, 'C', 1, order)`` for each solution, where ``order`` is +the order of the ODE. This is because ``constant_renumber`` renumbers the +arbitrary constants by printing order, which is platform dependent. Try to +test every corner case of your solver, including a range of orders if it is a +`n`\th order solver, but if your solver is slow, such as if it involves hard +integration, try to keep the test run time down. + +Feel free to refactor existing hints to avoid duplicating code or creating +inconsistencies. If you can show that your method exactly duplicates an +existing method, including in the simplicity and speed of obtaining the +solutions, then you can remove the old, less general method. The existing +code is tested extensively in ``test_ode.py``, so if anything is broken, one +of those tests will surely fail. + +""" + +from sympy.core import Add, S, Mul, Pow, oo +from sympy.core.containers import Tuple +from sympy.core.expr import AtomicExpr, Expr +from sympy.core.function import (Function, Derivative, AppliedUndef, diff, + expand, expand_mul, Subs) +from sympy.core.multidimensional import vectorize +from sympy.core.numbers import nan, zoo, Number +from sympy.core.relational import Equality, Eq +from sympy.core.sorting import default_sort_key, ordered +from sympy.core.symbol import Symbol, Wild, Dummy, symbols +from sympy.core.sympify import sympify +from sympy.core.traversal import preorder_traversal + +from sympy.logic.boolalg import (BooleanAtom, BooleanTrue, + BooleanFalse) +from sympy.functions import exp, log, sqrt +from sympy.functions.combinatorial.factorials import factorial +from sympy.integrals.integrals import Integral +from sympy.polys import (Poly, terms_gcd, PolynomialError, lcm) +from sympy.polys.polytools import cancel +from sympy.series import Order +from sympy.series.series import series +from sympy.simplify import (collect, logcombine, powsimp, # type: ignore + separatevars, simplify, cse) +from sympy.simplify.radsimp import collect_const +from sympy.solvers import checksol, solve + +from sympy.utilities import numbered_symbols +from sympy.utilities.iterables import uniq, sift, iterable +from sympy.solvers.deutils import _preprocess, ode_order, _desolve + + +#: This is a list of hints in the order that they should be preferred by +#: :py:meth:`~sympy.solvers.ode.classify_ode`. In general, hints earlier in the +#: list should produce simpler solutions than those later in the list (for +#: ODEs that fit both). For now, the order of this list is based on empirical +#: observations by the developers of SymPy. +#: +#: The hint used by :py:meth:`~sympy.solvers.ode.dsolve` for a specific ODE +#: can be overridden (see the docstring). +#: +#: In general, ``_Integral`` hints are grouped at the end of the list, unless +#: there is a method that returns an unevaluable integral most of the time +#: (which go near the end of the list anyway). ``default``, ``all``, +#: ``best``, and ``all_Integral`` meta-hints should not be included in this +#: list, but ``_best`` and ``_Integral`` hints should be included. +allhints = ( + "factorable", + "nth_algebraic", + "separable", + "1st_exact", + "1st_linear", + "Bernoulli", + "1st_rational_riccati", + "Riccati_special_minus2", + "1st_homogeneous_coeff_best", + "1st_homogeneous_coeff_subs_indep_div_dep", + "1st_homogeneous_coeff_subs_dep_div_indep", + "almost_linear", + "linear_coefficients", + "separable_reduced", + "1st_power_series", + "lie_group", + "nth_linear_constant_coeff_homogeneous", + "nth_linear_euler_eq_homogeneous", + "nth_linear_constant_coeff_undetermined_coefficients", + "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients", + "nth_linear_constant_coeff_variation_of_parameters", + "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters", + "Liouville", + "2nd_linear_airy", + "2nd_linear_bessel", + "2nd_hypergeometric", + "2nd_hypergeometric_Integral", + "nth_order_reducible", + "2nd_power_series_ordinary", + "2nd_power_series_regular", + "nth_algebraic_Integral", + "separable_Integral", + "1st_exact_Integral", + "1st_linear_Integral", + "Bernoulli_Integral", + "1st_homogeneous_coeff_subs_indep_div_dep_Integral", + "1st_homogeneous_coeff_subs_dep_div_indep_Integral", + "almost_linear_Integral", + "linear_coefficients_Integral", + "separable_reduced_Integral", + "nth_linear_constant_coeff_variation_of_parameters_Integral", + "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral", + "Liouville_Integral", + "2nd_nonlinear_autonomous_conserved", + "2nd_nonlinear_autonomous_conserved_Integral", + ) + + + +def get_numbered_constants(eq, num=1, start=1, prefix='C'): + """ + Returns a list of constants that do not occur + in eq already. + """ + + ncs = iter_numbered_constants(eq, start, prefix) + Cs = [next(ncs) for i in range(num)] + return (Cs[0] if num == 1 else tuple(Cs)) + + +def iter_numbered_constants(eq, start=1, prefix='C'): + """ + Returns an iterator of constants that do not occur + in eq already. + """ + + if isinstance(eq, (Expr, Eq)): + eq = [eq] + elif not iterable(eq): + raise ValueError("Expected Expr or iterable but got %s" % eq) + + atom_set = set().union(*[i.free_symbols for i in eq]) + func_set = set().union(*[i.atoms(Function) for i in eq]) + if func_set: + atom_set |= {Symbol(str(f.func)) for f in func_set} + return numbered_symbols(start=start, prefix=prefix, exclude=atom_set) + + +def dsolve(eq, func=None, hint="default", simplify=True, + ics= None, xi=None, eta=None, x0=0, n=6, **kwargs): + r""" + Solves any (supported) kind of ordinary differential equation and + system of ordinary differential equations. + + For single ordinary differential equation + ========================================= + + It is classified under this when number of equation in ``eq`` is one. + **Usage** + + ``dsolve(eq, f(x), hint)`` -> Solve ordinary differential equation + ``eq`` for function ``f(x)``, using method ``hint``. + + **Details** + + ``eq`` can be any supported ordinary differential equation (see the + :py:mod:`~sympy.solvers.ode` docstring for supported methods). + This can either be an :py:class:`~sympy.core.relational.Equality`, + or an expression, which is assumed to be equal to ``0``. + + ``f(x)`` is a function of one variable whose derivatives in that + variable make up the ordinary differential equation ``eq``. In + many cases it is not necessary to provide this; it will be + autodetected (and an error raised if it could not be detected). + + ``hint`` is the solving method that you want dsolve to use. Use + ``classify_ode(eq, f(x))`` to get all of the possible hints for an + ODE. The default hint, ``default``, will use whatever hint is + returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. See + Hints below for more options that you can use for hint. + + ``simplify`` enables simplification by + :py:meth:`~sympy.solvers.ode.ode.odesimp`. See its docstring for more + information. Turn this off, for example, to disable solving of + solutions for ``func`` or simplification of arbitrary constants. + It will still integrate with this hint. Note that the solution may + contain more arbitrary constants than the order of the ODE with + this option enabled. + + ``xi`` and ``eta`` are the infinitesimal functions of an ordinary + differential equation. They are the infinitesimals of the Lie group + of point transformations for which the differential equation is + invariant. The user can specify values for the infinitesimals. If + nothing is specified, ``xi`` and ``eta`` are calculated using + :py:meth:`~sympy.solvers.ode.infinitesimals` with the help of various + heuristics. + + ``ics`` is the set of initial/boundary conditions for the differential equation. + It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2): + x3}`` and so on. For power series solutions, if no initial + conditions are specified ``f(0)`` is assumed to be ``C0`` and the power + series solution is calculated about 0. + + ``x0`` is the point about which the power series solution of a differential + equation is to be evaluated. + + ``n`` gives the exponent of the dependent variable up to which the power series + solution of a differential equation is to be evaluated. + + **Hints** + + Aside from the various solving methods, there are also some meta-hints + that you can pass to :py:meth:`~sympy.solvers.ode.dsolve`: + + ``default``: + This uses whatever hint is returned first by + :py:meth:`~sympy.solvers.ode.classify_ode`. This is the + default argument to :py:meth:`~sympy.solvers.ode.dsolve`. + + ``all``: + To make :py:meth:`~sympy.solvers.ode.dsolve` apply all + relevant classification hints, use ``dsolve(ODE, func, + hint="all")``. This will return a dictionary of + ``hint:solution`` terms. If a hint causes dsolve to raise the + ``NotImplementedError``, value of that hint's key will be the + exception object raised. The dictionary will also include + some special keys: + + - ``order``: The order of the ODE. See also + :py:meth:`~sympy.solvers.deutils.ode_order` in + ``deutils.py``. + - ``best``: The simplest hint; what would be returned by + ``best`` below. + - ``best_hint``: The hint that would produce the solution + given by ``best``. If more than one hint produces the best + solution, the first one in the tuple returned by + :py:meth:`~sympy.solvers.ode.classify_ode` is chosen. + - ``default``: The solution that would be returned by default. + This is the one produced by the hint that appears first in + the tuple returned by + :py:meth:`~sympy.solvers.ode.classify_ode`. + + ``all_Integral``: + This is the same as ``all``, except if a hint also has a + corresponding ``_Integral`` hint, it only returns the + ``_Integral`` hint. This is useful if ``all`` causes + :py:meth:`~sympy.solvers.ode.dsolve` to hang because of a + difficult or impossible integral. This meta-hint will also be + much faster than ``all``, because + :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive + routine. + + ``best``: + To have :py:meth:`~sympy.solvers.ode.dsolve` try all methods + and return the simplest one. This takes into account whether + the solution is solvable in the function, whether it contains + any Integral classes (i.e. unevaluatable integrals), and + which one is the shortest in size. + + See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for + more info on hints, and the :py:mod:`~sympy.solvers.ode` docstring for + a list of all supported hints. + + **Tips** + + - You can declare the derivative of an unknown function this way: + + >>> from sympy import Function, Derivative + >>> from sympy.abc import x # x is the independent variable + >>> f = Function("f")(x) # f is a function of x + >>> # f_ will be the derivative of f with respect to x + >>> f_ = Derivative(f, x) + + - See ``test_ode.py`` for many tests, which serves also as a set of + examples for how to use :py:meth:`~sympy.solvers.ode.dsolve`. + - :py:meth:`~sympy.solvers.ode.dsolve` always returns an + :py:class:`~sympy.core.relational.Equality` class (except for the + case when the hint is ``all`` or ``all_Integral``). If possible, it + solves the solution explicitly for the function being solved for. + Otherwise, it returns an implicit solution. + - Arbitrary constants are symbols named ``C1``, ``C2``, and so on. + - Because all solutions should be mathematically equivalent, some + hints may return the exact same result for an ODE. Often, though, + two different hints will return the same solution formatted + differently. The two should be equivalent. Also note that sometimes + the values of the arbitrary constants in two different solutions may + not be the same, because one constant may have "absorbed" other + constants into it. + - Do ``help(ode.ode_)`` to get help more information on a + specific hint, where ```` is the name of a hint without + ``_Integral``. + + For system of ordinary differential equations + ============================================= + + **Usage** + ``dsolve(eq, func)`` -> Solve a system of ordinary differential + equations ``eq`` for ``func`` being list of functions including + `x(t)`, `y(t)`, `z(t)` where number of functions in the list depends + upon the number of equations provided in ``eq``. + + **Details** + + ``eq`` can be any supported system of ordinary differential equations + This can either be an :py:class:`~sympy.core.relational.Equality`, + or an expression, which is assumed to be equal to ``0``. + + ``func`` holds ``x(t)`` and ``y(t)`` being functions of one variable which + together with some of their derivatives make up the system of ordinary + differential equation ``eq``. It is not necessary to provide this; it + will be autodetected (and an error raised if it could not be detected). + + **Hints** + + The hints are formed by parameters returned by classify_sysode, combining + them give hints name used later for forming method name. + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq, Derivative, sin, cos, symbols + >>> from sympy.abc import x + >>> f = Function('f') + >>> dsolve(Derivative(f(x), x, x) + 9*f(x), f(x)) + Eq(f(x), C1*sin(3*x) + C2*cos(3*x)) + + >>> eq = sin(x)*cos(f(x)) + cos(x)*sin(f(x))*f(x).diff(x) + >>> dsolve(eq, hint='1st_exact') + [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))] + >>> dsolve(eq, hint='almost_linear') + [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))] + >>> t = symbols('t') + >>> x, y = symbols('x, y', cls=Function) + >>> eq = (Eq(Derivative(x(t),t), 12*t*x(t) + 8*y(t)), Eq(Derivative(y(t),t), 21*x(t) + 7*t*y(t))) + >>> dsolve(eq) + [Eq(x(t), C1*x0(t) + C2*x0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t)), + Eq(y(t), C1*y0(t) + C2*(y0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t) + + exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)))] + >>> eq = (Eq(Derivative(x(t),t),x(t)*y(t)*sin(t)), Eq(Derivative(y(t),t),y(t)**2*sin(t))) + >>> dsolve(eq) + {Eq(x(t), -exp(C1)/(C2*exp(C1) - cos(t))), Eq(y(t), -1/(C1 - cos(t)))} + """ + if iterable(eq): + from sympy.solvers.ode.systems import dsolve_system + + # This may have to be changed in future + # when we have weakly and strongly + # connected components. This have to + # changed to show the systems that haven't + # been solved. + try: + sol = dsolve_system(eq, funcs=func, ics=ics, doit=True) + return sol[0] if len(sol) == 1 else sol + except NotImplementedError: + pass + + match = classify_sysode(eq, func) + + eq = match['eq'] + order = match['order'] + func = match['func'] + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + + # keep highest order term coefficient positive + for i in range(len(eq)): + for func_ in func: + if isinstance(func_, list): + pass + else: + if eq[i].coeff(diff(func[i],t,ode_order(eq[i], func[i]))).is_negative: + eq[i] = -eq[i] + match['eq'] = eq + if len(set(order.values()))!=1: + raise ValueError("It solves only those systems of equations whose orders are equal") + match['order'] = list(order.values())[0] + def recur_len(l): + return sum(recur_len(item) if isinstance(item,list) else 1 for item in l) + if recur_len(func) != len(eq): + raise ValueError("dsolve() and classify_sysode() work with " + "number of functions being equal to number of equations") + if match['type_of_equation'] is None: + raise NotImplementedError + else: + if match['is_linear'] == True: + solvefunc = globals()['sysode_linear_%(no_of_equation)seq_order%(order)s' % match] + else: + solvefunc = globals()['sysode_nonlinear_%(no_of_equation)seq_order%(order)s' % match] + sols = solvefunc(match) + if ics: + constants = Tuple(*sols).free_symbols - Tuple(*eq).free_symbols + solved_constants = solve_ics(sols, func, constants, ics) + return [sol.subs(solved_constants) for sol in sols] + return sols + else: + given_hint = hint # hint given by the user + + # See the docstring of _desolve for more details. + hints = _desolve(eq, func=func, + hint=hint, simplify=True, xi=xi, eta=eta, type='ode', ics=ics, + x0=x0, n=n, **kwargs) + eq = hints.pop('eq', eq) + all_ = hints.pop('all', False) + if all_: + retdict = {} + failed_hints = {} + gethints = classify_ode(eq, dict=True, hint='all') + orderedhints = gethints['ordered_hints'] + for hint in hints: + try: + rv = _helper_simplify(eq, hint, hints[hint], simplify) + except NotImplementedError as detail: + failed_hints[hint] = detail + else: + retdict[hint] = rv + func = hints[hint]['func'] + + retdict['best'] = min(list(retdict.values()), key=lambda x: + ode_sol_simplicity(x, func, trysolving=not simplify)) + if given_hint == 'best': + return retdict['best'] + for i in orderedhints: + if retdict['best'] == retdict.get(i, None): + retdict['best_hint'] = i + break + retdict['default'] = gethints['default'] + retdict['order'] = gethints['order'] + retdict.update(failed_hints) + return retdict + + else: + # The key 'hint' stores the hint needed to be solved for. + hint = hints['hint'] + return _helper_simplify(eq, hint, hints, simplify, ics=ics) + + +def _helper_simplify(eq, hint, match, simplify=True, ics=None, **kwargs): + r""" + Helper function of dsolve that calls the respective + :py:mod:`~sympy.solvers.ode` functions to solve for the ordinary + differential equations. This minimizes the computation in calling + :py:meth:`~sympy.solvers.deutils._desolve` multiple times. + """ + r = match + func = r['func'] + order = r['order'] + match = r[hint] + + if isinstance(match, SingleODESolver): + solvefunc = match + else: + solvefunc = globals()['ode_' + hint.removesuffix('_Integral')] + + free = eq.free_symbols + cons = lambda s: s.free_symbols.difference(free) + + if simplify: + # odesimp() will attempt to integrate, if necessary, apply constantsimp(), + # attempt to solve for func, and apply any other hint specific + # simplifications + if isinstance(solvefunc, SingleODESolver): + sols = solvefunc.get_general_solution() + else: + sols = solvefunc(eq, func, order, match) + if iterable(sols): + rv = [] + for s in sols: + simp = odesimp(eq, s, func, hint) + if iterable(simp): + rv.extend(simp) + else: + rv.append(simp) + else: + rv = odesimp(eq, sols, func, hint) + else: + # We still want to integrate (you can disable it separately with the hint) + if isinstance(solvefunc, SingleODESolver): + exprs = solvefunc.get_general_solution(simplify=False) + else: + match['simplify'] = False # Some hints can take advantage of this option + exprs = solvefunc(eq, func, order, match) + if isinstance(exprs, list): + rv = [_handle_Integral(expr, func, hint) for expr in exprs] + else: + rv = _handle_Integral(exprs, func, hint) + + if isinstance(rv, list): + assert all(isinstance(i, Eq) for i in rv), rv # if not => internal error + if simplify: + rv = _remove_redundant_solutions(eq, rv, order, func.args[0]) + if len(rv) == 1: + rv = rv[0] + if ics and 'power_series' not in hint: + if isinstance(rv, (Expr, Eq)): + solved_constants = solve_ics([rv], [r['func']], cons(rv), ics) + rv = rv.subs(solved_constants) + else: + rv1 = [] + for s in rv: + try: + solved_constants = solve_ics([s], [r['func']], cons(s), ics) + except ValueError: + continue + rv1.append(s.subs(solved_constants)) + if len(rv1) == 1: + return rv1[0] + rv = rv1 + return rv + + +def solve_ics(sols, funcs, constants, ics): + """ + Solve for the constants given initial conditions + + ``sols`` is a list of solutions. + + ``funcs`` is a list of functions. + + ``constants`` is a list of constants. + + ``ics`` is the set of initial/boundary conditions for the differential + equation. It should be given in the form of ``{f(x0): x1, + f(x).diff(x).subs(x, x2): x3}`` and so on. + + Returns a dictionary mapping constants to values. + ``solution.subs(constants)`` will replace the constants in ``solution``. + + Example + ======= + >>> # From dsolve(f(x).diff(x) - f(x), f(x)) + >>> from sympy import symbols, Eq, exp, Function + >>> from sympy.solvers.ode.ode import solve_ics + >>> f = Function('f') + >>> x, C1 = symbols('x C1') + >>> sols = [Eq(f(x), C1*exp(x))] + >>> funcs = [f(x)] + >>> constants = [C1] + >>> ics = {f(0): 2} + >>> solved_constants = solve_ics(sols, funcs, constants, ics) + >>> solved_constants + {C1: 2} + >>> sols[0].subs(solved_constants) + Eq(f(x), 2*exp(x)) + + """ + # Assume ics are of the form f(x0): value or Subs(diff(f(x), x, n), (x, + # x0)): value (currently checked by classify_ode). To solve, replace x + # with x0, f(x0) with value, then solve for constants. For f^(n)(x0), + # differentiate the solution n times, so that f^(n)(x) appears. + x = funcs[0].args[0] + diff_sols = [] + subs_sols = [] + diff_variables = set() + for funcarg, value in ics.items(): + if isinstance(funcarg, AppliedUndef): + x0 = funcarg.args[0] + matching_func = [f for f in funcs if f.func == funcarg.func][0] + S = sols + elif isinstance(funcarg, (Subs, Derivative)): + if isinstance(funcarg, Subs): + # Make sure it stays a subs. Otherwise subs below will produce + # a different looking term. + funcarg = funcarg.doit() + if isinstance(funcarg, Subs): + deriv = funcarg.expr + x0 = funcarg.point[0] + variables = funcarg.expr.variables + matching_func = deriv + elif isinstance(funcarg, Derivative): + deriv = funcarg + x0 = funcarg.variables[0] + variables = (x,)*len(funcarg.variables) + matching_func = deriv.subs(x0, x) + for sol in sols: + if sol.has(deriv.expr.func): + diff_sols.append(Eq(sol.lhs.diff(*variables), sol.rhs.diff(*variables))) + diff_variables.add(variables) + S = diff_sols + else: + raise NotImplementedError("Unrecognized initial condition") + + for sol in S: + if sol.has(matching_func): + sol2 = sol + sol2 = sol2.subs(x, x0) + sol2 = sol2.subs(funcarg, value) + # This check is necessary because of issue #15724 + if not isinstance(sol2, BooleanAtom) or not subs_sols: + subs_sols = [s for s in subs_sols if not isinstance(s, BooleanAtom)] + subs_sols.append(sol2) + + # TODO: Use solveset here + try: + solved_constants = solve(subs_sols, constants, dict=True) + except NotImplementedError: + solved_constants = [] + + # XXX: We can't differentiate between the solution not existing because of + # invalid initial conditions, and not existing because solve is not smart + # enough. If we could use solveset, this might be improvable, but for now, + # we use NotImplementedError in this case. + if not solved_constants: + raise ValueError("Couldn't solve for initial conditions") + + if solved_constants == True: + raise ValueError("Initial conditions did not produce any solutions for constants. Perhaps they are degenerate.") + + if len(solved_constants) > 1: + raise NotImplementedError("Initial conditions produced too many solutions for constants") + + return solved_constants[0] + +def classify_ode(eq, func=None, dict=False, ics=None, *, prep=True, xi=None, eta=None, n=None, **kwargs): + r""" + Returns a tuple of possible :py:meth:`~sympy.solvers.ode.dsolve` + classifications for an ODE. + + The tuple is ordered so that first item is the classification that + :py:meth:`~sympy.solvers.ode.dsolve` uses to solve the ODE by default. In + general, classifications at the near the beginning of the list will + produce better solutions faster than those near the end, thought there are + always exceptions. To make :py:meth:`~sympy.solvers.ode.dsolve` use a + different classification, use ``dsolve(ODE, func, + hint=)``. See also the + :py:meth:`~sympy.solvers.ode.dsolve` docstring for different meta-hints + you can use. + + If ``dict`` is true, :py:meth:`~sympy.solvers.ode.classify_ode` will + return a dictionary of ``hint:match`` expression terms. This is intended + for internal use by :py:meth:`~sympy.solvers.ode.dsolve`. Note that + because dictionaries are ordered arbitrarily, this will most likely not be + in the same order as the tuple. + + You can get help on different hints by executing + ``help(ode.ode_hintname)``, where ``hintname`` is the name of the hint + without ``_Integral``. + + See :py:data:`~sympy.solvers.ode.allhints` or the + :py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints + that can be returned from :py:meth:`~sympy.solvers.ode.classify_ode`. + + Notes + ===== + + These are remarks on hint names. + + ``_Integral`` + + If a classification has ``_Integral`` at the end, it will return the + expression with an unevaluated :py:class:`~.Integral` + class in it. Note that a hint may do this anyway if + :py:meth:`~sympy.core.expr.Expr.integrate` cannot do the integral, + though just using an ``_Integral`` will do so much faster. Indeed, an + ``_Integral`` hint will always be faster than its corresponding hint + without ``_Integral`` because + :py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine. + If :py:meth:`~sympy.solvers.ode.dsolve` hangs, it is probably because + :py:meth:`~sympy.core.expr.Expr.integrate` is hanging on a tough or + impossible integral. Try using an ``_Integral`` hint or + ``all_Integral`` to get it return something. + + Note that some hints do not have ``_Integral`` counterparts. This is + because :py:func:`~sympy.integrals.integrals.integrate` is not used in + solving the ODE for those method. For example, `n`\th order linear + homogeneous ODEs with constant coefficients do not require integration + to solve, so there is no + ``nth_linear_homogeneous_constant_coeff_Integrate`` hint. You can + easily evaluate any unevaluated + :py:class:`~sympy.integrals.integrals.Integral`\s in an expression by + doing ``expr.doit()``. + + Ordinals + + Some hints contain an ordinal such as ``1st_linear``. This is to help + differentiate them from other hints, as well as from other methods + that may not be implemented yet. If a hint has ``nth`` in it, such as + the ``nth_linear`` hints, this means that the method used to applies + to ODEs of any order. + + ``indep`` and ``dep`` + + Some hints contain the words ``indep`` or ``dep``. These reference + the independent variable and the dependent function, respectively. For + example, if an ODE is in terms of `f(x)`, then ``indep`` will refer to + `x` and ``dep`` will refer to `f`. + + ``subs`` + + If a hints has the word ``subs`` in it, it means that the ODE is solved + by substituting the expression given after the word ``subs`` for a + single dummy variable. This is usually in terms of ``indep`` and + ``dep`` as above. The substituted expression will be written only in + characters allowed for names of Python objects, meaning operators will + be spelled out. For example, ``indep``/``dep`` will be written as + ``indep_div_dep``. + + ``coeff`` + + The word ``coeff`` in a hint refers to the coefficients of something + in the ODE, usually of the derivative terms. See the docstring for + the individual methods for more info (``help(ode)``). This is + contrast to ``coefficients``, as in ``undetermined_coefficients``, + which refers to the common name of a method. + + ``_best`` + + Methods that have more than one fundamental way to solve will have a + hint for each sub-method and a ``_best`` meta-classification. This + will evaluate all hints and return the best, using the same + considerations as the normal ``best`` meta-hint. + + + Examples + ======== + + >>> from sympy import Function, classify_ode, Eq + >>> from sympy.abc import x + >>> f = Function('f') + >>> classify_ode(Eq(f(x).diff(x), 0), f(x)) + ('nth_algebraic', + 'separable', + '1st_exact', + '1st_linear', + 'Bernoulli', + '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_power_series', 'lie_group', 'nth_linear_constant_coeff_homogeneous', + 'nth_linear_euler_eq_homogeneous', + 'nth_algebraic_Integral', 'separable_Integral', '1st_exact_Integral', + '1st_linear_Integral', 'Bernoulli_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral') + >>> classify_ode(f(x).diff(x, 2) + 3*f(x).diff(x) + 2*f(x) - 4) + ('factorable', 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + 'nth_linear_constant_coeff_variation_of_parameters_Integral') + + """ + ics = sympify(ics) + + if func and len(func.args) != 1: + raise ValueError("dsolve() and classify_ode() only " + "work with functions of one variable, not %s" % func) + + if isinstance(eq, Equality): + eq = eq.lhs - eq.rhs + + # Some methods want the unprocessed equation + eq_orig = eq + + if prep or func is None: + eq, func_ = _preprocess(eq, func) + if func is None: + func = func_ + x = func.args[0] + f = func.func + y = Dummy('y') + terms = 5 if n is None else n + + order = ode_order(eq, f(x)) + # hint:matchdict or hint:(tuple of matchdicts) + # Also will contain "default": and "order":order items. + matching_hints = {"order": order} + + df = f(x).diff(x) + a = Wild('a', exclude=[f(x)]) + d = Wild('d', exclude=[df, f(x).diff(x, 2)]) + e = Wild('e', exclude=[df]) + n = Wild('n', exclude=[x, f(x), df]) + c1 = Wild('c1', exclude=[x]) + a3 = Wild('a3', exclude=[f(x), df, f(x).diff(x, 2)]) + b3 = Wild('b3', exclude=[f(x), df, f(x).diff(x, 2)]) + c3 = Wild('c3', exclude=[f(x), df, f(x).diff(x, 2)]) + boundary = {} # Used to extract initial conditions + C1 = Symbol("C1") + + # Preprocessing to get the initial conditions out + if ics is not None: + for funcarg in ics: + # Separating derivatives + if isinstance(funcarg, (Subs, Derivative)): + # f(x).diff(x).subs(x, 0) is a Subs, but f(x).diff(x).subs(x, + # y) is a Derivative + if isinstance(funcarg, Subs): + deriv = funcarg.expr + old = funcarg.variables[0] + new = funcarg.point[0] + elif isinstance(funcarg, Derivative): + deriv = funcarg + # No information on this. Just assume it was x + old = x + new = funcarg.variables[0] + + if (isinstance(deriv, Derivative) and isinstance(deriv.args[0], + AppliedUndef) and deriv.args[0].func == f and + len(deriv.args[0].args) == 1 and old == x and not + new.has(x) and all(i == deriv.variables[0] for i in + deriv.variables) and x not in ics[funcarg].free_symbols): + + dorder = ode_order(deriv, x) + temp = 'f' + str(dorder) + boundary.update({temp: new, temp + 'val': ics[funcarg]}) + else: + raise ValueError("Invalid boundary conditions for Derivatives") + + + # Separating functions + elif isinstance(funcarg, AppliedUndef): + if (funcarg.func == f and len(funcarg.args) == 1 and + not funcarg.args[0].has(x) and x not in ics[funcarg].free_symbols): + boundary.update({'f0': funcarg.args[0], 'f0val': ics[funcarg]}) + else: + raise ValueError("Invalid boundary conditions for Function") + + else: + raise ValueError("Enter boundary conditions of the form ics={f(point): value, f(x).diff(x, order).subs(x, point): value}") + + ode = SingleODEProblem(eq_orig, func, x, prep=prep, xi=xi, eta=eta) + user_hint = kwargs.get('hint', 'default') + # Used when dsolve is called without an explicit hint. + # We exit early to return the first valid match + early_exit = (user_hint=='default') + user_hint = user_hint.removesuffix('_Integral') + user_map = solver_map + # An explicit hint has been given to dsolve + # Skip matching code for other hints + if user_hint not in ['default', 'all', 'all_Integral', 'best'] and user_hint in solver_map: + user_map = {user_hint: solver_map[user_hint]} + + for hint in user_map: + solver = user_map[hint](ode) + if solver.matches(): + matching_hints[hint] = solver + if user_map[hint].has_integral: + matching_hints[hint + "_Integral"] = solver + if dict and early_exit: + matching_hints["default"] = hint + return matching_hints + + eq = expand(eq) + # Precondition to try remove f(x) from highest order derivative + reduced_eq = None + if eq.is_Add: + deriv_coef = eq.coeff(f(x).diff(x, order)) + if deriv_coef not in (1, 0): + r = deriv_coef.match(a*f(x)**c1) + if r and r[c1]: + den = f(x)**r[c1] + reduced_eq = Add(*[arg/den for arg in eq.args]) + if not reduced_eq: + reduced_eq = eq + + if order == 1: + + # NON-REDUCED FORM OF EQUATION matches + r = collect(eq, df, exact=True).match(d + e * df) + if r: + r['d'] = d + r['e'] = e + r['y'] = y + r[d] = r[d].subs(f(x), y) + r[e] = r[e].subs(f(x), y) + + # FIRST ORDER POWER SERIES WHICH NEEDS INITIAL CONDITIONS + # TODO: Hint first order series should match only if d/e is analytic. + # For now, only d/e and (d/e).diff(arg) is checked for existence at + # at a given point. + # This is currently done internally in ode_1st_power_series. + point = boundary.get('f0', 0) + value = boundary.get('f0val', C1) + check = cancel(r[d]/r[e]) + check1 = check.subs({x: point, y: value}) + if not check1.has(oo) and not check1.has(zoo) and \ + not check1.has(nan) and not check1.has(-oo): + check2 = (check1.diff(x)).subs({x: point, y: value}) + if not check2.has(oo) and not check2.has(zoo) and \ + not check2.has(nan) and not check2.has(-oo): + rseries = r.copy() + rseries.update({'terms': terms, 'f0': point, 'f0val': value}) + matching_hints["1st_power_series"] = rseries + + elif order == 2: + # Homogeneous second order differential equation of the form + # a3*f(x).diff(x, 2) + b3*f(x).diff(x) + c3 + # It has a definite power series solution at point x0 if, b3/a3 and c3/a3 + # are analytic at x0. + deq = a3*(f(x).diff(x, 2)) + b3*df + c3*f(x) + r = collect(reduced_eq, + [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + ordinary = False + if r: + if not all(r[key].is_polynomial() for key in r): + n, d = reduced_eq.as_numer_denom() + reduced_eq = expand(n) + r = collect(reduced_eq, + [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + if r and r[a3] != 0: + p = cancel(r[b3]/r[a3]) # Used below + q = cancel(r[c3]/r[a3]) # Used below + point = kwargs.get('x0', 0) + check = p.subs(x, point) + if not check.has(oo, nan, zoo, -oo): + check = q.subs(x, point) + if not check.has(oo, nan, zoo, -oo): + ordinary = True + r.update({'a3': a3, 'b3': b3, 'c3': c3, 'x0': point, 'terms': terms}) + matching_hints["2nd_power_series_ordinary"] = r + + # Checking if the differential equation has a regular singular point + # at x0. It has a regular singular point at x0, if (b3/a3)*(x - x0) + # and (c3/a3)*((x - x0)**2) are analytic at x0. + if not ordinary: + p = cancel((x - point)*p) + check = p.subs(x, point) + if not check.has(oo, nan, zoo, -oo): + q = cancel(((x - point)**2)*q) + check = q.subs(x, point) + if not check.has(oo, nan, zoo, -oo): + coeff_dict = {'p': p, 'q': q, 'x0': point, 'terms': terms} + matching_hints["2nd_power_series_regular"] = coeff_dict + + + # Order keys based on allhints. + retlist = [i for i in allhints if i in matching_hints] + if dict: + # Dictionaries are ordered arbitrarily, so make note of which + # hint would come first for dsolve(). Use an ordered dict in Py 3. + matching_hints["default"] = retlist[0] if retlist else None + matching_hints["ordered_hints"] = tuple(retlist) + return matching_hints + else: + return tuple(retlist) + + +def classify_sysode(eq, funcs=None, **kwargs): + r""" + Returns a dictionary of parameter names and values that define the system + of ordinary differential equations in ``eq``. + The parameters are further used in + :py:meth:`~sympy.solvers.ode.dsolve` for solving that system. + + Some parameter names and values are: + + 'is_linear' (boolean), which tells whether the given system is linear. + Note that "linear" here refers to the operator: terms such as ``x*diff(x,t)`` are + nonlinear, whereas terms like ``sin(t)*diff(x,t)`` are still linear operators. + + 'func' (list) contains the :py:class:`~sympy.core.function.Function`s that + appear with a derivative in the ODE, i.e. those that we are trying to solve + the ODE for. + + 'order' (dict) with the maximum derivative for each element of the 'func' + parameter. + + 'func_coeff' (dict or Matrix) with the coefficient for each triple ``(equation number, + function, order)```. The coefficients are those subexpressions that do not + appear in 'func', and hence can be considered constant for purposes of ODE + solving. The value of this parameter can also be a Matrix if the system of ODEs are + linear first order of the form X' = AX where X is the vector of dependent variables. + Here, this function returns the coefficient matrix A. + + 'eq' (list) with the equations from ``eq``, sympified and transformed into + expressions (we are solving for these expressions to be zero). + + 'no_of_equations' (int) is the number of equations (same as ``len(eq)``). + + 'type_of_equation' (string) is an internal classification of the type of + ODE. + + 'is_constant' (boolean), which tells if the system of ODEs is constant coefficient + or not. This key is temporary addition for now and is in the match dict only when + the system of ODEs is linear first order constant coefficient homogeneous. So, this + key's value is True for now if it is available else it does not exist. + + 'is_homogeneous' (boolean), which tells if the system of ODEs is homogeneous. Like the + key 'is_constant', this key is a temporary addition and it is True since this key value + is available only when the system is linear first order constant coefficient homogeneous. + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode-toc1.htm + -A. D. Polyanin and A. V. Manzhirov, Handbook of Mathematics for Engineers and Scientists + + Examples + ======== + + >>> from sympy import Function, Eq, symbols, diff + >>> from sympy.solvers.ode.ode import classify_sysode + >>> from sympy.abc import t + >>> f, x, y = symbols('f, x, y', cls=Function) + >>> k, l, m, n = symbols('k, l, m, n', Integer=True) + >>> x1 = diff(x(t), t) ; y1 = diff(y(t), t) + >>> x2 = diff(x(t), t, t) ; y2 = diff(y(t), t, t) + >>> eq = (Eq(x1, 12*x(t) - 6*y(t)), Eq(y1, 11*x(t) + 3*y(t))) + >>> classify_sysode(eq) + {'eq': [-12*x(t) + 6*y(t) + Derivative(x(t), t), -11*x(t) - 3*y(t) + Derivative(y(t), t)], 'func': [x(t), y(t)], + 'func_coeff': {(0, x(t), 0): -12, (0, x(t), 1): 1, (0, y(t), 0): 6, (0, y(t), 1): 0, (1, x(t), 0): -11, (1, x(t), 1): 0, (1, y(t), 0): -3, (1, y(t), 1): 1}, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': None} + >>> eq = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t) + 2), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t))) + >>> classify_sysode(eq) + {'eq': [-t**2*y(t) - 5*t*x(t) + Derivative(x(t), t) - 2, t**2*x(t) - 5*t*y(t) + Derivative(y(t), t)], + 'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -5*t, (0, x(t), 1): 1, (0, y(t), 0): -t**2, (0, y(t), 1): 0, + (1, x(t), 0): t**2, (1, x(t), 1): 0, (1, y(t), 0): -5*t, (1, y(t), 1): 1}, 'is_linear': True, 'no_of_equation': 2, + 'order': {x(t): 1, y(t): 1}, 'type_of_equation': None} + + """ + + # Sympify equations and convert iterables of equations into + # a list of equations + def _sympify(eq): + return list(map(sympify, eq if iterable(eq) else [eq])) + + eq, funcs = (_sympify(w) for w in [eq, funcs]) + for i, fi in enumerate(eq): + if isinstance(fi, Equality): + eq[i] = fi.lhs - fi.rhs + + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + matching_hints = {"no_of_equation":i+1} + matching_hints['eq'] = eq + if i==0: + raise ValueError("classify_sysode() works for systems of ODEs. " + "For scalar ODEs, classify_ode should be used") + + # find all the functions if not given + order = {} + if funcs==[None]: + funcs = _extract_funcs(eq) + + funcs = list(set(funcs)) + if len(funcs) != len(eq): + raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs) + + # This logic of list of lists in funcs to + # be replaced later. + func_dict = {} + for func in funcs: + if not order.get(func, False): + max_order = 0 + for i, eqs_ in enumerate(eq): + order_ = ode_order(eqs_,func) + if max_order < order_: + max_order = order_ + eq_no = i + if eq_no in func_dict: + func_dict[eq_no] = [func_dict[eq_no], func] + else: + func_dict[eq_no] = func + order[func] = max_order + + funcs = [func_dict[i] for i in range(len(func_dict))] + matching_hints['func'] = funcs + for func in funcs: + if isinstance(func, list): + for func_elem in func: + if len(func_elem.args) != 1: + raise ValueError("dsolve() and classify_sysode() work with " + "functions of one variable only, not %s" % func) + else: + if func and len(func.args) != 1: + raise ValueError("dsolve() and classify_sysode() work with " + "functions of one variable only, not %s" % func) + + # find the order of all equation in system of odes + matching_hints["order"] = order + + # find coefficients of terms f(t), diff(f(t),t) and higher derivatives + # and similarly for other functions g(t), diff(g(t),t) in all equations. + # Here j denotes the equation number, funcs[l] denotes the function about + # which we are talking about and k denotes the order of function funcs[l] + # whose coefficient we are calculating. + def linearity_check(eqs, j, func, is_linear_): + for k in range(order[func] + 1): + func_coef[j, func, k] = collect(eqs.expand(), [diff(func, t, k)]).coeff(diff(func, t, k)) + if is_linear_ == True: + if func_coef[j, func, k] == 0: + if k == 0: + coef = eqs.as_independent(func, as_Add=True)[1] + for xr in range(1, ode_order(eqs,func) + 1): + coef -= eqs.as_independent(diff(func, t, xr), as_Add=True)[1] + if coef != 0: + is_linear_ = False + else: + if eqs.as_independent(diff(func, t, k), as_Add=True)[1]: + is_linear_ = False + else: + for func_ in funcs: + if isinstance(func_, list): + for elem_func_ in func_: + dep = func_coef[j, func, k].as_independent(elem_func_, as_Add=True)[1] + if dep != 0: + is_linear_ = False + else: + dep = func_coef[j, func, k].as_independent(func_, as_Add=True)[1] + if dep != 0: + is_linear_ = False + return is_linear_ + + func_coef = {} + is_linear = True + for j, eqs in enumerate(eq): + for func in funcs: + if isinstance(func, list): + for func_elem in func: + is_linear = linearity_check(eqs, j, func_elem, is_linear) + else: + is_linear = linearity_check(eqs, j, func, is_linear) + matching_hints['func_coeff'] = func_coef + matching_hints['is_linear'] = is_linear + + + if len(set(order.values())) == 1: + order_eq = list(matching_hints['order'].values())[0] + if matching_hints['is_linear'] == True: + if matching_hints['no_of_equation'] == 2: + if order_eq == 1: + type_of_equation = check_linear_2eq_order1(eq, funcs, func_coef) + else: + type_of_equation = None + # If the equation does not match up with any of the + # general case solvers in systems.py and the number + # of equations is greater than 2, then NotImplementedError + # should be raised. + else: + type_of_equation = None + + else: + if matching_hints['no_of_equation'] == 2: + if order_eq == 1: + type_of_equation = check_nonlinear_2eq_order1(eq, funcs, func_coef) + else: + type_of_equation = None + elif matching_hints['no_of_equation'] == 3: + if order_eq == 1: + type_of_equation = check_nonlinear_3eq_order1(eq, funcs, func_coef) + else: + type_of_equation = None + else: + type_of_equation = None + else: + type_of_equation = None + + matching_hints['type_of_equation'] = type_of_equation + + return matching_hints + + +def check_linear_2eq_order1(eq, func, func_coef): + x = func[0].func + y = func[1].func + fc = func_coef + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + r = {} + # for equations Eq(a1*diff(x(t),t), b1*x(t) + c1*y(t) + d1) + # and Eq(a2*diff(y(t),t), b2*x(t) + c2*y(t) + d2) + r['a1'] = fc[0,x(t),1] ; r['a2'] = fc[1,y(t),1] + r['b1'] = -fc[0,x(t),0]/fc[0,x(t),1] ; r['b2'] = -fc[1,x(t),0]/fc[1,y(t),1] + r['c1'] = -fc[0,y(t),0]/fc[0,x(t),1] ; r['c2'] = -fc[1,y(t),0]/fc[1,y(t),1] + forcing = [S.Zero,S.Zero] + for i in range(2): + for j in Add.make_args(eq[i]): + if not j.has(x(t), y(t)): + forcing[i] += j + if not (forcing[0].has(t) or forcing[1].has(t)): + # We can handle homogeneous case and simple constant forcings + r['d1'] = forcing[0] + r['d2'] = forcing[1] + else: + # Issue #9244: nonhomogeneous linear systems are not supported + return None + + # Conditions to check for type 6 whose equations are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and + # Eq(diff(y(t),t), a*[f(t) + a*h(t)]x(t) + a*[g(t) - h(t)]*y(t)) + p = 0 + q = 0 + p1 = cancel(r['b2']/(cancel(r['b2']/r['c2']).as_numer_denom()[0])) + p2 = cancel(r['b1']/(cancel(r['b1']/r['c1']).as_numer_denom()[0])) + for n, i in enumerate([p1, p2]): + for j in Mul.make_args(collect_const(i)): + if not j.has(t): + q = j + if q and n==0: + if ((r['b2']/j - r['b1'])/(r['c1'] - r['c2']/j)) == j: + p = 1 + elif q and n==1: + if ((r['b1']/j - r['b2'])/(r['c2'] - r['c1']/j)) == j: + p = 2 + # End of condition for type 6 + + if r['d1']!=0 or r['d2']!=0: + return None + else: + if not any(r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()): + return None + else: + r['b1'] = r['b1']/r['a1'] ; r['b2'] = r['b2']/r['a2'] + r['c1'] = r['c1']/r['a1'] ; r['c2'] = r['c2']/r['a2'] + if p: + return "type6" + else: + # Equations for type 7 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), h(t)*x(t) + p(t)*y(t)) + return "type7" +def check_nonlinear_2eq_order1(eq, func, func_coef): + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + f = Wild('f') + g = Wild('g') + u, v = symbols('u, v', cls=Dummy) + def check_type(x, y): + r1 = eq[0].match(t*diff(x(t),t) - x(t) + f) + r2 = eq[1].match(t*diff(y(t),t) - y(t) + g) + if not (r1 and r2): + r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) + r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) + if not (r1 and r2): + r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f) + r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g) + if not (r1 and r2): + r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) + r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) + if r1 and r2 and not (r1[f].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t) \ + or r2[g].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t)): + return 'type5' + else: + return None + for func_ in func: + if isinstance(func_, list): + x = func[0][0].func + y = func[0][1].func + eq_type = check_type(x, y) + if not eq_type: + eq_type = check_type(y, x) + return eq_type + x = func[0].func + y = func[1].func + fc = func_coef + n = Wild('n', exclude=[x(t),y(t)]) + f1 = Wild('f1', exclude=[v,t]) + f2 = Wild('f2', exclude=[v,t]) + g1 = Wild('g1', exclude=[u,t]) + g2 = Wild('g2', exclude=[u,t]) + for i in range(2): + eqs = 0 + for terms in Add.make_args(eq[i]): + eqs += terms/fc[i,func[i],1] + eq[i] = eqs + r = eq[0].match(diff(x(t),t) - x(t)**n*f) + if r: + g = (diff(y(t),t) - eq[1])/r[f] + if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): + return 'type1' + r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f) + if r: + g = (diff(y(t),t) - eq[1])/r[f] + if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)): + return 'type2' + g = Wild('g') + r1 = eq[0].match(diff(x(t),t) - f) + r2 = eq[1].match(diff(y(t),t) - g) + if r1 and r2 and not (r1[f].subs(x(t),u).subs(y(t),v).has(t) or \ + r2[g].subs(x(t),u).subs(y(t),v).has(t)): + return 'type3' + r1 = eq[0].match(diff(x(t),t) - f) + r2 = eq[1].match(diff(y(t),t) - g) + num, den = ( + (r1[f].subs(x(t),u).subs(y(t),v))/ + (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() + R1 = num.match(f1*g1) + R2 = den.match(f2*g2) + # phi = (r1[f].subs(x(t),u).subs(y(t),v))/num + if R1 and R2: + return 'type4' + return None + + +def check_nonlinear_2eq_order2(eq, func, func_coef): + return None + +def check_nonlinear_3eq_order1(eq, func, func_coef): + x = func[0].func + y = func[1].func + z = func[2].func + fc = func_coef + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + u, v, w = symbols('u, v, w', cls=Dummy) + a = Wild('a', exclude=[x(t), y(t), z(t), t]) + b = Wild('b', exclude=[x(t), y(t), z(t), t]) + c = Wild('c', exclude=[x(t), y(t), z(t), t]) + f = Wild('f') + F1 = Wild('F1') + F2 = Wild('F2') + F3 = Wild('F3') + for i in range(3): + eqs = 0 + for terms in Add.make_args(eq[i]): + eqs += terms/fc[i,func[i],1] + eq[i] = eqs + r1 = eq[0].match(diff(x(t),t) - a*y(t)*z(t)) + r2 = eq[1].match(diff(y(t),t) - b*z(t)*x(t)) + r3 = eq[2].match(diff(z(t),t) - c*x(t)*y(t)) + if r1 and r2 and r3: + num1, den1 = r1[a].as_numer_denom() + num2, den2 = r2[b].as_numer_denom() + num3, den3 = r3[c].as_numer_denom() + if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]): + return 'type1' + r = eq[0].match(diff(x(t),t) - y(t)*z(t)*f) + if r: + r1 = collect_const(r[f]).match(a*f) + r2 = ((diff(y(t),t) - eq[1])/r1[f]).match(b*z(t)*x(t)) + r3 = ((diff(z(t),t) - eq[2])/r1[f]).match(c*x(t)*y(t)) + if r1 and r2 and r3: + num1, den1 = r1[a].as_numer_denom() + num2, den2 = r2[b].as_numer_denom() + num3, den3 = r3[c].as_numer_denom() + if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]): + return 'type2' + r = eq[0].match(diff(x(t),t) - (F2-F3)) + if r: + r1 = collect_const(r[F2]).match(c*F2) + r1.update(collect_const(r[F3]).match(b*F3)) + if r1: + if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): + r1[F2], r1[F3] = r1[F3], r1[F2] + r1[c], r1[b] = -r1[b], -r1[c] + r2 = eq[1].match(diff(y(t),t) - a*r1[F3] + r1[c]*F1) + if r2: + r3 = (eq[2] == diff(z(t),t) - r1[b]*r2[F1] + r2[a]*r1[F2]) + if r1 and r2 and r3: + return 'type3' + r = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3) + if r: + r1 = collect_const(r[F2]).match(c*F2) + r1.update(collect_const(r[F3]).match(b*F3)) + if r1: + if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): + r1[F2], r1[F3] = r1[F3], r1[F2] + r1[c], r1[b] = -r1[b], -r1[c] + r2 = (diff(y(t),t) - eq[1]).match(a*x(t)*r1[F3] - r1[c]*z(t)*F1) + if r2: + r3 = (diff(z(t),t) - eq[2] == r1[b]*y(t)*r2[F1] - r2[a]*x(t)*r1[F2]) + if r1 and r2 and r3: + return 'type4' + r = (diff(x(t),t) - eq[0]).match(x(t)*(F2 - F3)) + if r: + r1 = collect_const(r[F2]).match(c*F2) + r1.update(collect_const(r[F3]).match(b*F3)) + if r1: + if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]): + r1[F2], r1[F3] = r1[F3], r1[F2] + r1[c], r1[b] = -r1[b], -r1[c] + r2 = (diff(y(t),t) - eq[1]).match(y(t)*(a*r1[F3] - r1[c]*F1)) + if r2: + r3 = (diff(z(t),t) - eq[2] == z(t)*(r1[b]*r2[F1] - r2[a]*r1[F2])) + if r1 and r2 and r3: + return 'type5' + return None + + +def check_nonlinear_3eq_order2(eq, func, func_coef): + return None + + +@vectorize(0) +def odesimp(ode, eq, func, hint): + r""" + Simplifies solutions of ODEs, including trying to solve for ``func`` and + running :py:meth:`~sympy.solvers.ode.constantsimp`. + + It may use knowledge of the type of solution that the hint returns to + apply additional simplifications. + + It also attempts to integrate any :py:class:`~sympy.integrals.integrals.Integral`\s + in the expression, if the hint is not an ``_Integral`` hint. + + This function should have no effect on expressions returned by + :py:meth:`~sympy.solvers.ode.dsolve`, as + :py:meth:`~sympy.solvers.ode.dsolve` already calls + :py:meth:`~sympy.solvers.ode.ode.odesimp`, but the individual hint functions + do not call :py:meth:`~sympy.solvers.ode.ode.odesimp` (because the + :py:meth:`~sympy.solvers.ode.dsolve` wrapper does). Therefore, this + function is designed for mainly internal use. + + Examples + ======== + + >>> from sympy import sin, symbols, dsolve, pprint, Function + >>> from sympy.solvers.ode.ode import odesimp + >>> x, u2, C1= symbols('x,u2,C1') + >>> f = Function('f') + + >>> eq = dsolve(x*f(x).diff(x) - f(x) - x*sin(f(x)/x), f(x), + ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral', + ... simplify=False) + >>> pprint(eq, wrap_line=False) + x + ---- + f(x) + / + | + | / 1 \ + | -|u1 + -------| + | | /1 \| + | | sin|--|| + | \ \u1// + log(f(x)) = log(C1) + | ---------------- d(u1) + | 2 + | u1 + | + / + + >>> pprint(odesimp(eq, f(x), 1, {C1}, + ... hint='1st_homogeneous_coeff_subs_indep_div_dep' + ... )) #doctest: +SKIP + x + --------- = C1 + /f(x)\ + tan|----| + \2*x / + + """ + x = func.args[0] + f = func.func + C1 = get_numbered_constants(eq, num=1) + constants = eq.free_symbols - ode.free_symbols + + # First, integrate if the hint allows it. + eq = _handle_Integral(eq, func, hint) + if hint.startswith("nth_linear_euler_eq_nonhomogeneous"): + eq = simplify(eq) + if not isinstance(eq, Equality): + raise TypeError("eq should be an instance of Equality") + + # allow simplifications under assumption that symbols are nonzero + eq = eq.xreplace((_:={i: Dummy(nonzero=True) for i in constants})).xreplace({_[i]: i for i in _}) + + # Second, clean up the arbitrary constants. + # Right now, nth linear hints can put as many as 2*order constants in an + # expression. If that number grows with another hint, the third argument + # here should be raised accordingly, or constantsimp() rewritten to handle + # an arbitrary number of constants. + eq = constantsimp(eq, constants) + + # Lastly, now that we have cleaned up the expression, try solving for func. + # When CRootOf is implemented in solve(), we will want to return a CRootOf + # every time instead of an Equality. + + # Get the f(x) on the left if possible. + if eq.rhs == func and not eq.lhs.has(func): + eq = [Eq(eq.rhs, eq.lhs)] + + # make sure we are working with lists of solutions in simplified form. + if eq.lhs == func and not eq.rhs.has(func): + # The solution is already solved + eq = [eq] + + else: + # The solution is not solved, so try to solve it + try: + floats = any(i.is_Float for i in eq.atoms(Number)) + eqsol = solve(eq, func, force=True, rational=False if floats else None) + if not eqsol: + raise NotImplementedError + except (NotImplementedError, PolynomialError): + eq = [eq] + else: + def _expand(expr): + numer, denom = expr.as_numer_denom() + + if denom.is_Add: + return expr + else: + return powsimp(expr.expand(), combine='exp', deep=True) + + # XXX: the rest of odesimp() expects each ``t`` to be in a + # specific normal form: rational expression with numerator + # expanded, but with combined exponential functions (at + # least in this setup all tests pass). + eq = [Eq(f(x), _expand(t)) for t in eqsol] + + # special simplification of the lhs. + if hint.startswith("1st_homogeneous_coeff"): + for j, eqi in enumerate(eq): + newi = logcombine(eqi, force=True) + if isinstance(newi.lhs, log) and newi.rhs == 0: + newi = Eq(newi.lhs.args[0]/C1, C1) + eq[j] = newi + + # We cleaned up the constants before solving to help the solve engine with + # a simpler expression, but the solved expression could have introduced + # things like -C1, so rerun constantsimp() one last time before returning. + for i, eqi in enumerate(eq): + eq[i] = constantsimp(eqi, constants) + eq[i] = constant_renumber(eq[i], ode.free_symbols) + + # If there is only 1 solution, return it; + # otherwise return the list of solutions. + if len(eq) == 1: + eq = eq[0] + return eq + + +def ode_sol_simplicity(sol, func, trysolving=True): + r""" + Returns an extended integer representing how simple a solution to an ODE + is. + + The following things are considered, in order from most simple to least: + + - ``sol`` is solved for ``func``. + - ``sol`` is not solved for ``func``, but can be if passed to solve (e.g., + a solution returned by ``dsolve(ode, func, simplify=False``). + - If ``sol`` is not solved for ``func``, then base the result on the + length of ``sol``, as computed by ``len(str(sol))``. + - If ``sol`` has any unevaluated :py:class:`~sympy.integrals.integrals.Integral`\s, + this will automatically be considered less simple than any of the above. + + This function returns an integer such that if solution A is simpler than + solution B by above metric, then ``ode_sol_simplicity(sola, func) < + ode_sol_simplicity(solb, func)``. + + Currently, the following are the numbers returned, but if the heuristic is + ever improved, this may change. Only the ordering is guaranteed. + + +----------------------------------------------+-------------------+ + | Simplicity | Return | + +==============================================+===================+ + | ``sol`` solved for ``func`` | ``-2`` | + +----------------------------------------------+-------------------+ + | ``sol`` not solved for ``func`` but can be | ``-1`` | + +----------------------------------------------+-------------------+ + | ``sol`` is not solved nor solvable for | ``len(str(sol))`` | + | ``func`` | | + +----------------------------------------------+-------------------+ + | ``sol`` contains an | ``oo`` | + | :obj:`~sympy.integrals.integrals.Integral` | | + +----------------------------------------------+-------------------+ + + ``oo`` here means the SymPy infinity, which should compare greater than + any integer. + + If you already know :py:meth:`~sympy.solvers.solvers.solve` cannot solve + ``sol``, you can use ``trysolving=False`` to skip that step, which is the + only potentially slow step. For example, + :py:meth:`~sympy.solvers.ode.dsolve` with the ``simplify=False`` flag + should do this. + + If ``sol`` is a list of solutions, if the worst solution in the list + returns ``oo`` it returns that, otherwise it returns ``len(str(sol))``, + that is, the length of the string representation of the whole list. + + Examples + ======== + + This function is designed to be passed to ``min`` as the key argument, + such as ``min(listofsolutions, key=lambda i: ode_sol_simplicity(i, + f(x)))``. + + >>> from sympy import symbols, Function, Eq, tan, Integral + >>> from sympy.solvers.ode.ode import ode_sol_simplicity + >>> x, C1, C2 = symbols('x, C1, C2') + >>> f = Function('f') + + >>> ode_sol_simplicity(Eq(f(x), C1*x**2), f(x)) + -2 + >>> ode_sol_simplicity(Eq(x**2 + f(x), C1), f(x)) + -1 + >>> ode_sol_simplicity(Eq(f(x), C1*Integral(2*x, x)), f(x)) + oo + >>> eq1 = Eq(f(x)/tan(f(x)/(2*x)), C1) + >>> eq2 = Eq(f(x)/tan(f(x)/(2*x) + f(x)), C2) + >>> [ode_sol_simplicity(eq, f(x)) for eq in [eq1, eq2]] + [28, 35] + >>> min([eq1, eq2], key=lambda i: ode_sol_simplicity(i, f(x))) + Eq(f(x)/tan(f(x)/(2*x)), C1) + + """ + # TODO: if two solutions are solved for f(x), we still want to be + # able to get the simpler of the two + + # See the docstring for the coercion rules. We check easier (faster) + # things here first, to save time. + + if iterable(sol): + # See if there are Integrals + for i in sol: + if ode_sol_simplicity(i, func, trysolving=trysolving) == oo: + return oo + + return len(str(sol)) + + if sol.has(Integral): + return oo + + # Next, try to solve for func. This code will change slightly when CRootOf + # is implemented in solve(). Probably a CRootOf solution should fall + # somewhere between a normal solution and an unsolvable expression. + + # First, see if they are already solved + if sol.lhs == func and not sol.rhs.has(func) or \ + sol.rhs == func and not sol.lhs.has(func): + return -2 + # We are not so lucky, try solving manually + if trysolving: + try: + sols = solve(sol, func) + if not sols: + raise NotImplementedError + except NotImplementedError: + pass + else: + return -1 + + # Finally, a naive computation based on the length of the string version + # of the expression. This may favor combined fractions because they + # will not have duplicate denominators, and may slightly favor expressions + # with fewer additions and subtractions, as those are separated by spaces + # by the printer. + + # Additional ideas for simplicity heuristics are welcome, like maybe + # checking if a equation has a larger domain, or if constantsimp has + # introduced arbitrary constants numbered higher than the order of a + # given ODE that sol is a solution of. + return len(str(sol)) + + +def _extract_funcs(eqs): + funcs = [] + for eq in eqs: + derivs = [node for node in preorder_traversal(eq) if isinstance(node, Derivative)] + func = [] + for d in derivs: + func += list(d.atoms(AppliedUndef)) + for func_ in func: + funcs.append(func_) + funcs = list(uniq(funcs)) + + return funcs + + +def _get_constant_subexpressions(expr, Cs): + Cs = set(Cs) + Ces = [] + def _recursive_walk(expr): + expr_syms = expr.free_symbols + if expr_syms and expr_syms.issubset(Cs): + Ces.append(expr) + else: + if expr.func == exp: + expr = expr.expand(mul=True) + if expr.func in (Add, Mul): + d = sift(expr.args, lambda i : i.free_symbols.issubset(Cs)) + if len(d[True]) > 1: + x = expr.func(*d[True]) + if not x.is_number: + Ces.append(x) + elif isinstance(expr, Integral): + if expr.free_symbols.issubset(Cs) and \ + all(len(x) == 3 for x in expr.limits): + Ces.append(expr) + for i in expr.args: + _recursive_walk(i) + return + _recursive_walk(expr) + return Ces + +def __remove_linear_redundancies(expr, Cs): + cnts = {i: expr.count(i) for i in Cs} + Cs = [i for i in Cs if cnts[i] > 0] + + def _linear(expr): + if isinstance(expr, Add): + xs = [i for i in Cs if expr.count(i)==cnts[i] \ + and 0 == expr.diff(i, 2)] + d = {} + for x in xs: + y = expr.diff(x) + if y not in d: + d[y]=[] + d[y].append(x) + for y in d: + if len(d[y]) > 1: + d[y].sort(key=str) + for x in d[y][1:]: + expr = expr.subs(x, 0) + return expr + + def _recursive_walk(expr): + if len(expr.args) != 0: + expr = expr.func(*[_recursive_walk(i) for i in expr.args]) + expr = _linear(expr) + return expr + + if isinstance(expr, Equality): + lhs, rhs = [_recursive_walk(i) for i in expr.args] + f = lambda i: isinstance(i, Number) or i in Cs + if isinstance(lhs, Symbol) and lhs in Cs: + rhs, lhs = lhs, rhs + if lhs.func in (Add, Symbol) and rhs.func in (Add, Symbol): + dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) + drhs = sift([rhs] if isinstance(rhs, AtomicExpr) else rhs.args, f) + for i in [True, False]: + for hs in [dlhs, drhs]: + if i not in hs: + hs[i] = [0] + # this calculation can be simplified + lhs = Add(*dlhs[False]) - Add(*drhs[False]) + rhs = Add(*drhs[True]) - Add(*dlhs[True]) + elif lhs.func in (Mul, Symbol) and rhs.func in (Mul, Symbol): + dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f) + if True in dlhs: + if False not in dlhs: + dlhs[False] = [1] + lhs = Mul(*dlhs[False]) + rhs = rhs/Mul(*dlhs[True]) + return Eq(lhs, rhs) + else: + return _recursive_walk(expr) + +@vectorize(0) +def constantsimp(expr, constants): + r""" + Simplifies an expression with arbitrary constants in it. + + This function is written specifically to work with + :py:meth:`~sympy.solvers.ode.dsolve`, and is not intended for general use. + + Simplification is done by "absorbing" the arbitrary constants into other + arbitrary constants, numbers, and symbols that they are not independent + of. + + The symbols must all have the same name with numbers after it, for + example, ``C1``, ``C2``, ``C3``. The ``symbolname`` here would be + '``C``', the ``startnumber`` would be 1, and the ``endnumber`` would be 3. + If the arbitrary constants are independent of the variable ``x``, then the + independent symbol would be ``x``. There is no need to specify the + dependent function, such as ``f(x)``, because it already has the + independent symbol, ``x``, in it. + + Because terms are "absorbed" into arbitrary constants and because + constants are renumbered after simplifying, the arbitrary constants in + expr are not necessarily equal to the ones of the same name in the + returned result. + + If two or more arbitrary constants are added, multiplied, or raised to the + power of each other, they are first absorbed together into a single + arbitrary constant. Then the new constant is combined into other terms if + necessary. + + Absorption of constants is done with limited assistance: + + 1. terms of :py:class:`~sympy.core.add.Add`\s are collected to try join + constants so `e^x (C_1 \cos(x) + C_2 \cos(x))` will simplify to `e^x + C_1 \cos(x)`; + + 2. powers with exponents that are :py:class:`~sympy.core.add.Add`\s are + expanded so `e^{C_1 + x}` will be simplified to `C_1 e^x`. + + Use :py:meth:`~sympy.solvers.ode.ode.constant_renumber` to renumber constants + after simplification or else arbitrary numbers on constants may appear, + e.g. `C_1 + C_3 x`. + + In rare cases, a single constant can be "simplified" into two constants. + Every differential equation solution should have as many arbitrary + constants as the order of the differential equation. The result here will + be technically correct, but it may, for example, have `C_1` and `C_2` in + an expression, when `C_1` is actually equal to `C_2`. Use your discretion + in such situations, and also take advantage of the ability to use hints in + :py:meth:`~sympy.solvers.ode.dsolve`. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.solvers.ode.ode import constantsimp + >>> C1, C2, C3, x, y = symbols('C1, C2, C3, x, y') + >>> constantsimp(2*C1*x, {C1, C2, C3}) + C1*x + >>> constantsimp(C1 + 2 + x, {C1, C2, C3}) + C1 + x + >>> constantsimp(C1*C2 + 2 + C2 + C3*x, {C1, C2, C3}) + C1 + C3*x + + """ + # This function works recursively. The idea is that, for Mul, + # Add, Pow, and Function, if the class has a constant in it, then + # we can simplify it, which we do by recursing down and + # simplifying up. Otherwise, we can skip that part of the + # expression. + + Cs = constants + + orig_expr = expr + + constant_subexprs = _get_constant_subexpressions(expr, Cs) + for xe in constant_subexprs: + xes = list(xe.free_symbols) + if not xes: + continue + if all(expr.count(c) == xe.count(c) for c in xes): + xes.sort(key=str) + expr = expr.subs(xe, xes[0]) + + # try to perform common sub-expression elimination of constant terms + try: + commons, rexpr = cse(expr) + commons.reverse() + rexpr = rexpr[0] + for s in commons: + cs = list(s[1].atoms(Symbol)) + if len(cs) == 1 and cs[0] in Cs and \ + cs[0] not in rexpr.atoms(Symbol) and \ + not any(cs[0] in ex for ex in commons if ex != s): + rexpr = rexpr.subs(s[0], cs[0]) + else: + rexpr = rexpr.subs(*s) + expr = rexpr + except IndexError: + pass + expr = __remove_linear_redundancies(expr, Cs) + + def _conditional_term_factoring(expr): + new_expr = terms_gcd(expr, clear=False, deep=True, expand=False) + + # we do not want to factor exponentials, so handle this separately + if new_expr.is_Mul: + infac = False + asfac = False + for m in new_expr.args: + if isinstance(m, exp): + asfac = True + elif m.is_Add: + infac = any(isinstance(fi, exp) for t in m.args + for fi in Mul.make_args(t)) + if asfac and infac: + new_expr = expr + break + return new_expr + + expr = _conditional_term_factoring(expr) + + # call recursively if more simplification is possible + if orig_expr != expr: + return constantsimp(expr, Cs) + return expr + + +def constant_renumber(expr, variables=None, newconstants=None): + r""" + Renumber arbitrary constants in ``expr`` to use the symbol names as given + in ``newconstants``. In the process, this reorders expression terms in a + standard way. + + If ``newconstants`` is not provided then the new constant names will be + ``C1``, ``C2`` etc. Otherwise ``newconstants`` should be an iterable + giving the new symbols to use for the constants in order. + + The ``variables`` argument is a list of non-constant symbols. All other + free symbols found in ``expr`` are assumed to be constants and will be + renumbered. If ``variables`` is not given then any numbered symbol + beginning with ``C`` (e.g. ``C1``) is assumed to be a constant. + + Symbols are renumbered based on ``.sort_key()``, so they should be + numbered roughly in the order that they appear in the final, printed + expression. Note that this ordering is based in part on hashes, so it can + produce different results on different machines. + + The structure of this function is very similar to that of + :py:meth:`~sympy.solvers.ode.constantsimp`. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.solvers.ode.ode import constant_renumber + >>> x, C1, C2, C3 = symbols('x,C1:4') + >>> expr = C3 + C2*x + C1*x**2 + >>> expr + C1*x**2 + C2*x + C3 + >>> constant_renumber(expr) + C1 + C2*x + C3*x**2 + + The ``variables`` argument specifies which are constants so that the + other symbols will not be renumbered: + + >>> constant_renumber(expr, [C1, x]) + C1*x**2 + C2 + C3*x + + The ``newconstants`` argument is used to specify what symbols to use when + replacing the constants: + + >>> constant_renumber(expr, [x], newconstants=symbols('E1:4')) + E1 + E2*x + E3*x**2 + + """ + + # System of expressions + if isinstance(expr, (set, list, tuple)): + return type(expr)(constant_renumber(Tuple(*expr), + variables=variables, newconstants=newconstants)) + + # Symbols in solution but not ODE are constants + if variables is not None: + variables = set(variables) + free_symbols = expr.free_symbols + constantsymbols = list(free_symbols - variables) + # Any Cn is a constant... + else: + variables = set() + isconstant = lambda s: s.startswith('C') and s[1:].isdigit() + constantsymbols = [sym for sym in expr.free_symbols if isconstant(sym.name)] + + # Find new constants checking that they aren't already in the ODE + if newconstants is None: + iter_constants = numbered_symbols(start=1, prefix='C', exclude=variables) + else: + iter_constants = (sym for sym in newconstants if sym not in variables) + + constants_found = [] + + # make a mapping to send all constantsymbols to S.One and use + # that to make sure that term ordering is not dependent on + # the indexed value of C + C_1 = [(ci, S.One) for ci in constantsymbols] + sort_key=lambda arg: default_sort_key(arg.subs(C_1)) + + def _constant_renumber(expr): + r""" + We need to have an internal recursive function + """ + + # For system of expressions + if isinstance(expr, Tuple): + renumbered = [_constant_renumber(e) for e in expr] + return Tuple(*renumbered) + + if isinstance(expr, Equality): + return Eq( + _constant_renumber(expr.lhs), + _constant_renumber(expr.rhs)) + + if type(expr) not in (Mul, Add, Pow) and not expr.is_Function and \ + not expr.has(*constantsymbols): + # Base case, as above. Hope there aren't constants inside + # of some other class, because they won't be renumbered. + return expr + elif expr.is_Piecewise: + return expr + elif expr in constantsymbols: + if expr not in constants_found: + constants_found.append(expr) + return expr + elif expr.is_Function or expr.is_Pow: + return expr.func( + *[_constant_renumber(x) for x in expr.args]) + else: + sortedargs = list(expr.args) + sortedargs.sort(key=sort_key) + return expr.func(*[_constant_renumber(x) for x in sortedargs]) + expr = _constant_renumber(expr) + + # Don't renumber symbols present in the ODE. + constants_found = [c for c in constants_found if c not in variables] + + # Renumbering happens here + subs_dict = dict(zip(constants_found, iter_constants)) + expr = expr.subs(subs_dict, simultaneous=True) + + return expr + + +def _handle_Integral(expr, func, hint): + r""" + Converts a solution with Integrals in it into an actual solution. + + For most hints, this simply runs ``expr.doit()``. + + """ + if hint == "nth_linear_constant_coeff_homogeneous": + sol = expr + elif not hint.endswith("_Integral"): + sol = expr.doit() + else: + sol = expr + return sol + + +# XXX: Should this function maybe go somewhere else? + + +def homogeneous_order(eq, *symbols): + r""" + Returns the order `n` if `g` is homogeneous and ``None`` if it is not + homogeneous. + + Determines if a function is homogeneous and if so of what order. A + function `f(x, y, \cdots)` is homogeneous of order `n` if `f(t x, t y, + \cdots) = t^n f(x, y, \cdots)`. + + If the function is of two variables, `F(x, y)`, then `f` being homogeneous + of any order is equivalent to being able to rewrite `F(x, y)` as `G(x/y)` + or `H(y/x)`. This fact is used to solve 1st order ordinary differential + equations whose coefficients are homogeneous of the same order (see the + docstrings of + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsDepDivIndep` and + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsIndepDivDep`). + + Symbols can be functions, but every argument of the function must be a + symbol, and the arguments of the function that appear in the expression + must match those given in the list of symbols. If a declared function + appears with different arguments than given in the list of symbols, + ``None`` is returned. + + Examples + ======== + + >>> from sympy import Function, homogeneous_order, sqrt + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> homogeneous_order(f(x), f(x)) is None + True + >>> homogeneous_order(f(x,y), f(y, x), x, y) is None + True + >>> homogeneous_order(f(x), f(x), x) + 1 + >>> homogeneous_order(x**2*f(x)/sqrt(x**2+f(x)**2), x, f(x)) + 2 + >>> homogeneous_order(x**2+f(x), x, f(x)) is None + True + + """ + + if not symbols: + raise ValueError("homogeneous_order: no symbols were given.") + symset = set(symbols) + eq = sympify(eq) + + # The following are not supported + if eq.has(Order, Derivative): + return None + + # These are all constants + if (eq.is_Number or + eq.is_NumberSymbol or + eq.is_number + ): + return S.Zero + + # Replace all functions with dummy variables + dum = numbered_symbols(prefix='d', cls=Dummy) + newsyms = set() + for i in [j for j in symset if getattr(j, 'is_Function')]: + iargs = set(i.args) + if iargs.difference(symset): + return None + else: + dummyvar = next(dum) + eq = eq.subs(i, dummyvar) + symset.remove(i) + newsyms.add(dummyvar) + symset.update(newsyms) + + if not eq.free_symbols & symset: + return None + + # assuming order of a nested function can only be equal to zero + if isinstance(eq, Function): + return None if homogeneous_order( + eq.args[0], *tuple(symset)) != 0 else S.Zero + + # make the replacement of x with x*t and see if t can be factored out + t = Dummy('t', positive=True) # It is sufficient that t > 0 + eqs = separatevars(eq.subs([(i, t*i) for i in symset]), [t], dict=True)[t] + if eqs is S.One: + return S.Zero # there was no term with only t + i, d = eqs.as_independent(t, as_Add=False) + b, e = d.as_base_exp() + if b == t: + return e + + +def ode_2nd_power_series_ordinary(eq, func, order, match): + r""" + Gives a power series solution to a second order homogeneous differential + equation with polynomial coefficients at an ordinary point. A homogeneous + differential equation is of the form + + .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) y(x) = 0 + + For simplicity it is assumed that `P(x)`, `Q(x)` and `R(x)` are polynomials, + it is sufficient that `\frac{Q(x)}{P(x)}` and `\frac{R(x)}{P(x)}` exists at + `x_{0}`. A recurrence relation is obtained by substituting `y` as `\sum_{n=0}^\infty a_{n}x^{n}`, + in the differential equation, and equating the nth term. Using this relation + various terms can be generated. + + + Examples + ======== + + >>> from sympy import dsolve, Function, pprint + >>> from sympy.abc import x + >>> f = Function("f") + >>> eq = f(x).diff(x, 2) + f(x) + >>> pprint(dsolve(eq, hint='2nd_power_series_ordinary')) + / 4 2 \ / 2\ + |x x | | x | / 6\ + f(x) = C2*|-- - -- + 1| + C1*x*|1 - --| + O\x / + \24 2 / \ 6 / + + + References + ========== + - https://tutorial.math.lamar.edu/Classes/DE/SeriesSolutions.aspx + - George E. Simmons, "Differential Equations with Applications and + Historical Notes", p.p 176 - 184 + + """ + x = func.args[0] + f = func.func + C0, C1 = get_numbered_constants(eq, num=2) + n = Dummy("n", integer=True) + s = Wild("s") + k = Wild("k", exclude=[x]) + x0 = match['x0'] + terms = match['terms'] + p = match[match['a3']] + q = match[match['b3']] + r = match[match['c3']] + seriesdict = {} + recurr = Function("r") + + # Generating the recurrence relation which works this way: + # for the second order term the summation begins at n = 2. The coefficients + # p is multiplied with an*(n - 1)*(n - 2)*x**n-2 and a substitution is made such that + # the exponent of x becomes n. + # For example, if p is x, then the second degree recurrence term is + # an*(n - 1)*(n - 2)*x**n-1, substituting (n - 1) as n, it transforms to + # an+1*n*(n - 1)*x**n. + # A similar process is done with the first order and zeroth order term. + + coefflist = [(recurr(n), r), (n*recurr(n), q), (n*(n - 1)*recurr(n), p)] + for index, coeff in enumerate(coefflist): + if coeff[1]: + f2 = powsimp(expand((coeff[1]*(x - x0)**(n - index)).subs(x, x + x0))) + if f2.is_Add: + addargs = f2.args + else: + addargs = [f2] + for arg in addargs: + powm = arg.match(s*x**k) + term = coeff[0]*powm[s] + if not powm[k].is_Symbol: + term = term.subs(n, n - powm[k].as_independent(n)[0]) + startind = powm[k].subs(n, index) + # Seeing if the startterm can be reduced further. + # If it vanishes for n lesser than startind, it is + # equal to summation from n. + if startind: + for i in reversed(range(startind)): + if not term.subs(n, i): + seriesdict[term] = i + else: + seriesdict[term] = i + 1 + break + else: + seriesdict[term] = S.Zero + + # Stripping of terms so that the sum starts with the same number. + teq = S.Zero + suminit = seriesdict.values() + rkeys = seriesdict.keys() + req = Add(*rkeys) + if any(suminit): + maxval = max(suminit) + for term in seriesdict: + val = seriesdict[term] + if val != maxval: + for i in range(val, maxval): + teq += term.subs(n, val) + + finaldict = {} + if teq: + fargs = teq.atoms(AppliedUndef) + if len(fargs) == 1: + finaldict[fargs.pop()] = 0 + else: + maxf = max(fargs, key = lambda x: x.args[0]) + sol = solve(teq, maxf) + if isinstance(sol, list): + sol = sol[0] + finaldict[maxf] = sol + + # Finding the recurrence relation in terms of the largest term. + fargs = req.atoms(AppliedUndef) + maxf = max(fargs, key = lambda x: x.args[0]) + minf = min(fargs, key = lambda x: x.args[0]) + if minf.args[0].is_Symbol: + startiter = 0 + else: + startiter = -minf.args[0].as_independent(n)[0] + lhs = maxf + rhs = solve(req, maxf) + if isinstance(rhs, list): + rhs = rhs[0] + + # Checking how many values are already present + tcounter = len([t for t in finaldict.values() if t]) + + for _ in range(tcounter, terms - 3): # Assuming c0 and c1 to be arbitrary + check = rhs.subs(n, startiter) + nlhs = lhs.subs(n, startiter) + nrhs = check.subs(finaldict) + finaldict[nlhs] = nrhs + startiter += 1 + + # Post processing + series = C0 + C1*(x - x0) + for term in finaldict: + if finaldict[term]: + fact = term.args[0] + series += (finaldict[term].subs([(recurr(0), C0), (recurr(1), C1)])*( + x - x0)**fact) + series = collect(expand_mul(series), [C0, C1]) + Order(x**terms) + return Eq(f(x), series) + + +def ode_2nd_power_series_regular(eq, func, order, match): + r""" + Gives a power series solution to a second order homogeneous differential + equation with polynomial coefficients at a regular point. A second order + homogeneous differential equation is of the form + + .. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) y(x) = 0 + + A point is said to regular singular at `x0` if `x - x0\frac{Q(x)}{P(x)}` + and `(x - x0)^{2}\frac{R(x)}{P(x)}` are analytic at `x0`. For simplicity + `P(x)`, `Q(x)` and `R(x)` are assumed to be polynomials. The algorithm for + finding the power series solutions is: + + 1. Try expressing `(x - x0)P(x)` and `((x - x0)^{2})Q(x)` as power series + solutions about x0. Find `p0` and `q0` which are the constants of the + power series expansions. + 2. Solve the indicial equation `f(m) = m(m - 1) + m*p0 + q0`, to obtain the + roots `m1` and `m2` of the indicial equation. + 3. If `m1 - m2` is a non integer there exists two series solutions. If + `m1 = m2`, there exists only one solution. If `m1 - m2` is an integer, + then the existence of one solution is confirmed. The other solution may + or may not exist. + + The power series solution is of the form `x^{m}\sum_{n=0}^\infty a_{n}x^{n}`. The + coefficients are determined by the following recurrence relation. + `a_{n} = -\frac{\sum_{k=0}^{n-1} q_{n-k} + (m + k)p_{n-k}}{f(m + n)}`. For the case + in which `m1 - m2` is an integer, it can be seen from the recurrence relation + that for the lower root `m`, when `n` equals the difference of both the + roots, the denominator becomes zero. So if the numerator is not equal to zero, + a second series solution exists. + + + Examples + ======== + + >>> from sympy import dsolve, Function, pprint + >>> from sympy.abc import x + >>> f = Function("f") + >>> eq = x*(f(x).diff(x, 2)) + 2*(f(x).diff(x)) + x*f(x) + >>> pprint(dsolve(eq, hint='2nd_power_series_regular')) + / 6 4 2 \ + | x x x | + / 4 2 \ C1*|- --- + -- - -- + 1| + |x x | \ 720 24 2 / / 6\ + f(x) = C2*|--- - -- + 1| + ------------------------ + O\x / + \120 6 / x + + + References + ========== + - George E. Simmons, "Differential Equations with Applications and + Historical Notes", p.p 176 - 184 + + """ + x = func.args[0] + f = func.func + C0, C1 = get_numbered_constants(eq, num=2) + m = Dummy("m") # for solving the indicial equation + x0 = match['x0'] + terms = match['terms'] + p = match['p'] + q = match['q'] + + # Generating the indicial equation + indicial = [] + for term in [p, q]: + if not term.has(x): + indicial.append(term) + else: + term = series(term, x=x, n=1, x0=x0) + if isinstance(term, Order): + indicial.append(S.Zero) + else: + for arg in term.args: + if not arg.has(x): + indicial.append(arg) + break + + p0, q0 = indicial + sollist = solve(m*(m - 1) + m*p0 + q0, m) + if sollist and isinstance(sollist, list) and all( + sol.is_real for sol in sollist): + serdict1 = {} + serdict2 = {} + if len(sollist) == 1: + # Only one series solution exists in this case. + m1 = m2 = sollist.pop() + if terms-m1-1 <= 0: + return Eq(f(x), Order(terms)) + serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) + + else: + m1 = sollist[0] + m2 = sollist[1] + if m1 < m2: + m1, m2 = m2, m1 + # Irrespective of whether m1 - m2 is an integer or not, one + # Frobenius series solution exists. + serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0) + if not (m1 - m2).is_integer: + # Second frobenius series solution exists. + serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1) + else: + # Check if second frobenius series solution exists. + serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1, check=m1) + + if serdict1: + finalseries1 = C0 + for key in serdict1: + power = int(key.name[1:]) + finalseries1 += serdict1[key]*(x - x0)**power + finalseries1 = (x - x0)**m1*finalseries1 + finalseries2 = S.Zero + if serdict2: + for key in serdict2: + power = int(key.name[1:]) + finalseries2 += serdict2[key]*(x - x0)**power + finalseries2 += C1 + finalseries2 = (x - x0)**m2*finalseries2 + return Eq(f(x), collect(finalseries1 + finalseries2, + [C0, C1]) + Order(x**terms)) + + +def _frobenius(n, m, p0, q0, p, q, x0, x, c, check=None): + r""" + Returns a dict with keys as coefficients and values as their values in terms of C0 + """ + n = int(n) + # In cases where m1 - m2 is not an integer + m2 = check + + d = Dummy("d") + numsyms = numbered_symbols("C", start=0) + numsyms = [next(numsyms) for i in range(n + 1)] + serlist = [] + for ser in [p, q]: + # Order term not present + if ser.is_polynomial(x) and Poly(ser, x).degree() <= n: + if x0: + ser = ser.subs(x, x + x0) + dict_ = Poly(ser, x).as_dict() + # Order term present + else: + tseries = series(ser, x=x0, n=n+1) + # Removing order + dict_ = Poly(list(ordered(tseries.args))[: -1], x).as_dict() + # Fill in with zeros, if coefficients are zero. + for i in range(n + 1): + if (i,) not in dict_: + dict_[(i,)] = S.Zero + serlist.append(dict_) + + pseries = serlist[0] + qseries = serlist[1] + indicial = d*(d - 1) + d*p0 + q0 + frobdict = {} + for i in range(1, n + 1): + num = c*(m*pseries[(i,)] + qseries[(i,)]) + for j in range(1, i): + sym = Symbol("C" + str(j)) + num += frobdict[sym]*((m + j)*pseries[(i - j,)] + qseries[(i - j,)]) + + # Checking for cases when m1 - m2 is an integer. If num equals zero + # then a second Frobenius series solution cannot be found. If num is not zero + # then set constant as zero and proceed. + if m2 is not None and i == m2 - m: + if num: + return False + else: + frobdict[numsyms[i]] = S.Zero + else: + frobdict[numsyms[i]] = -num/(indicial.subs(d, m+i)) + + return frobdict + +def _remove_redundant_solutions(eq, solns, order, var): + r""" + Remove redundant solutions from the set of solutions. + + This function is needed because otherwise dsolve can return + redundant solutions. As an example consider: + + eq = Eq((f(x).diff(x, 2))*f(x).diff(x), 0) + + There are two ways to find solutions to eq. The first is to solve f(x).diff(x, 2) = 0 + leading to solution f(x)=C1 + C2*x. The second is to solve the equation f(x).diff(x) = 0 + leading to the solution f(x) = C1. In this particular case we then see + that the second solution is a special case of the first and we do not + want to return it. + + This does not always happen. If we have + + eq = Eq((f(x)**2-4)*(f(x).diff(x)-4), 0) + + then we get the algebraic solution f(x) = [-2, 2] and the integral solution + f(x) = x + C1 and in this case the two solutions are not equivalent wrt + initial conditions so both should be returned. + """ + def is_special_case_of(soln1, soln2): + return _is_special_case_of(soln1, soln2, eq, order, var) + + unique_solns = [] + for soln1 in solns: + for soln2 in unique_solns.copy(): + if is_special_case_of(soln1, soln2): + break + elif is_special_case_of(soln2, soln1): + unique_solns.remove(soln2) + else: + unique_solns.append(soln1) + + return unique_solns + +def _is_special_case_of(soln1, soln2, eq, order, var): + r""" + True if soln1 is found to be a special case of soln2 wrt some value of the + constants that appear in soln2. False otherwise. + """ + # The solutions returned by dsolve may be given explicitly or implicitly. + # We will equate the sol1=(soln1.rhs - soln1.lhs), sol2=(soln2.rhs - soln2.lhs) + # of the two solutions. + # + # Since this is supposed to hold for all x it also holds for derivatives. + # For an order n ode we should be able to differentiate + # each solution n times to get n+1 equations. + # + # We then try to solve those n+1 equations for the integrations constants + # in sol2. If we can find a solution that does not depend on x then it + # means that some value of the constants in sol1 is a special case of + # sol2 corresponding to a particular choice of the integration constants. + + # In case the solution is in implicit form we subtract the sides + soln1 = soln1.rhs - soln1.lhs + soln2 = soln2.rhs - soln2.lhs + + # Work for the series solution + if soln1.has(Order) and soln2.has(Order): + if soln1.getO() == soln2.getO(): + soln1 = soln1.removeO() + soln2 = soln2.removeO() + else: + return False + elif soln1.has(Order) or soln2.has(Order): + return False + + constants1 = soln1.free_symbols.difference(eq.free_symbols) + constants2 = soln2.free_symbols.difference(eq.free_symbols) + + constants1_new = get_numbered_constants(Tuple(soln1, soln2), len(constants1)) + if len(constants1) == 1: + constants1_new = {constants1_new} + for c_old, c_new in zip(constants1, constants1_new): + soln1 = soln1.subs(c_old, c_new) + + # n equations for sol1 = sol2, sol1'=sol2', ... + lhs = soln1 + rhs = soln2 + eqns = [Eq(lhs, rhs)] + for n in range(1, order): + lhs = lhs.diff(var) + rhs = rhs.diff(var) + eq = Eq(lhs, rhs) + eqns.append(eq) + + # BooleanTrue/False awkwardly show up for trivial equations + if any(isinstance(eq, BooleanFalse) for eq in eqns): + return False + eqns = [eq for eq in eqns if not isinstance(eq, BooleanTrue)] + + try: + constant_solns = solve(eqns, constants2) + except NotImplementedError: + return False + + # Sometimes returns a dict and sometimes a list of dicts + if isinstance(constant_solns, dict): + constant_solns = [constant_solns] + + # after solving the issue 17418, maybe we don't need the following checksol code. + for constant_soln in constant_solns: + for eq in eqns: + eq=eq.rhs-eq.lhs + if checksol(eq, constant_soln) is not True: + return False + + # If any solution gives all constants as expressions that don't depend on + # x then there exists constants for soln2 that give soln1 + for constant_soln in constant_solns: + if not any(c.has(var) for c in constant_soln.values()): + return True + + return False + + +def ode_1st_power_series(eq, func, order, match): + r""" + The power series solution is a method which gives the Taylor series expansion + to the solution of a differential equation. + + For a first order differential equation `\frac{dy}{dx} = h(x, y)`, a power + series solution exists at a point `x = x_{0}` if `h(x, y)` is analytic at `x_{0}`. + The solution is given by + + .. math:: y(x) = y(x_{0}) + \sum_{n = 1}^{\infty} \frac{F_{n}(x_{0},b)(x - x_{0})^n}{n!}, + + where `y(x_{0}) = b` is the value of y at the initial value of `x_{0}`. + To compute the values of the `F_{n}(x_{0},b)` the following algorithm is + followed, until the required number of terms are generated. + + 1. `F_1 = h(x_{0}, b)` + 2. `F_{n+1} = \frac{\partial F_{n}}{\partial x} + \frac{\partial F_{n}}{\partial y}F_{1}` + + Examples + ======== + + >>> from sympy import Function, pprint, exp, dsolve + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = exp(x)*(f(x).diff(x)) - f(x) + >>> pprint(dsolve(eq, hint='1st_power_series')) + 3 4 5 + C1*x C1*x C1*x / 6\ + f(x) = C1 + C1*x - ----- + ----- + ----- + O\x / + 6 24 60 + + + References + ========== + + - Travis W. Walker, Analytic power series technique for solving first-order + differential equations, p.p 17, 18 + + """ + x = func.args[0] + y = match['y'] + f = func.func + h = -match[match['d']]/match[match['e']] + point = match['f0'] + value = match['f0val'] + terms = match['terms'] + + # First term + F = h + if not h: + return Eq(f(x), value) + + # Initialization + series = value + if terms > 1: + hc = h.subs({x: point, y: value}) + if hc.has(oo) or hc.has(nan) or hc.has(zoo): + # Derivative does not exist, not analytic + return Eq(f(x), oo) + elif hc: + series += hc*(x - point) + + for factcount in range(2, terms): + Fnew = F.diff(x) + F.diff(y)*h + Fnewc = Fnew.subs({x: point, y: value}) + # Same logic as above + if Fnewc.has(oo) or Fnewc.has(nan) or Fnewc.has(-oo) or Fnewc.has(zoo): + return Eq(f(x), oo) + series += Fnewc*((x - point)**factcount)/factorial(factcount) + F = Fnew + series += Order(x**terms) + return Eq(f(x), series) + + +def checkinfsol(eq, infinitesimals, func=None, order=None): + r""" + This function is used to check if the given infinitesimals are the + actual infinitesimals of the given first order differential equation. + This method is specific to the Lie Group Solver of ODEs. + + As of now, it simply checks, by substituting the infinitesimals in the + partial differential equation. + + + .. math:: \frac{\partial \eta}{\partial x} + \left(\frac{\partial \eta}{\partial y} + - \frac{\partial \xi}{\partial x}\right)*h + - \frac{\partial \xi}{\partial y}*h^{2} + - \xi\frac{\partial h}{\partial x} - \eta\frac{\partial h}{\partial y} = 0 + + + where `\eta`, and `\xi` are the infinitesimals and `h(x,y) = \frac{dy}{dx}` + + The infinitesimals should be given in the form of a list of dicts + ``[{xi(x, y): inf, eta(x, y): inf}]``, corresponding to the + output of the function infinitesimals. It returns a list + of values of the form ``[(True/False, sol)]`` where ``sol`` is the value + obtained after substituting the infinitesimals in the PDE. If it + is ``True``, then ``sol`` would be 0. + + """ + if isinstance(eq, Equality): + eq = eq.lhs - eq.rhs + if not func: + eq, func = _preprocess(eq) + variables = func.args + if len(variables) != 1: + raise ValueError("ODE's have only one independent variable") + else: + x = variables[0] + if not order: + order = ode_order(eq, func) + if order != 1: + raise NotImplementedError("Lie groups solver has been implemented " + "only for first order differential equations") + else: + df = func.diff(x) + a = Wild('a', exclude = [df]) + b = Wild('b', exclude = [df]) + match = collect(expand(eq), df).match(a*df + b) + + if match: + h = -simplify(match[b]/match[a]) + else: + try: + sol = solve(eq, df) + except NotImplementedError: + raise NotImplementedError("Infinitesimals for the " + "first order ODE could not be found") + else: + h = sol[0] # Find infinitesimals for one solution + + y = Dummy('y') + h = h.subs(func, y) + xi = Function('xi')(x, y) + eta = Function('eta')(x, y) + dxi = Function('xi')(x, func) + deta = Function('eta')(x, func) + pde = (eta.diff(x) + (eta.diff(y) - xi.diff(x))*h - + (xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y))) + soltup = [] + for sol in infinitesimals: + tsol = {xi: S(sol[dxi]).subs(func, y), + eta: S(sol[deta]).subs(func, y)} + sol = simplify(pde.subs(tsol).doit()) + if sol: + soltup.append((False, sol.subs(y, func))) + else: + soltup.append((True, 0)) + return soltup + + +def sysode_linear_2eq_order1(match_): + x = match_['func'][0].func + y = match_['func'][1].func + func = match_['func'] + fc = match_['func_coeff'] + eq = match_['eq'] + r = {} + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + for i in range(2): + eq[i] = Add(*[terms/fc[i,func[i],1] for terms in Add.make_args(eq[i])]) + + # for equations Eq(a1*diff(x(t),t), a*x(t) + b*y(t) + k1) + # and Eq(a2*diff(x(t),t), c*x(t) + d*y(t) + k2) + r['a'] = -fc[0,x(t),0]/fc[0,x(t),1] + r['c'] = -fc[1,x(t),0]/fc[1,y(t),1] + r['b'] = -fc[0,y(t),0]/fc[0,x(t),1] + r['d'] = -fc[1,y(t),0]/fc[1,y(t),1] + forcing = [S.Zero,S.Zero] + for i in range(2): + for j in Add.make_args(eq[i]): + if not j.has(x(t), y(t)): + forcing[i] += j + if not (forcing[0].has(t) or forcing[1].has(t)): + r['k1'] = forcing[0] + r['k2'] = forcing[1] + else: + raise NotImplementedError("Only homogeneous problems are supported" + + " (and constant inhomogeneity)") + + if match_['type_of_equation'] == 'type6': + sol = _linear_2eq_order1_type6(x, y, t, r, eq) + if match_['type_of_equation'] == 'type7': + sol = _linear_2eq_order1_type7(x, y, t, r, eq) + return sol + +def _linear_2eq_order1_type6(x, y, t, r, eq): + r""" + The equations of this type of ode are . + + .. math:: x' = f(t) x + g(t) y + + .. math:: y' = a [f(t) + a h(t)] x + a [g(t) - h(t)] y + + This is solved by first multiplying the first equation by `-a` and adding + it to the second equation to obtain + + .. math:: y' - a x' = -a h(t) (y - a x) + + Setting `U = y - ax` and integrating the equation we arrive at + + .. math:: y - ax = C_1 e^{-a \int h(t) \,dt} + + and on substituting the value of y in first equation give rise to first order ODEs. After solving for + `x`, we can obtain `y` by substituting the value of `x` in second equation. + + """ + C1, C2, C3, C4 = get_numbered_constants(eq, num=4) + p = 0 + q = 0 + p1 = cancel(r['c']/cancel(r['c']/r['d']).as_numer_denom()[0]) + p2 = cancel(r['a']/cancel(r['a']/r['b']).as_numer_denom()[0]) + for n, i in enumerate([p1, p2]): + for j in Mul.make_args(collect_const(i)): + if not j.has(t): + q = j + if q!=0 and n==0: + if ((r['c']/j - r['a'])/(r['b'] - r['d']/j)) == j: + p = 1 + s = j + break + if q!=0 and n==1: + if ((r['a']/j - r['c'])/(r['d'] - r['b']/j)) == j: + p = 2 + s = j + break + + if p == 1: + equ = diff(x(t),t) - r['a']*x(t) - r['b']*(s*x(t) + C1*exp(-s*Integral(r['b'] - r['d']/s, t))) + hint1 = classify_ode(equ)[1] + sol1 = dsolve(equ, hint=hint1+'_Integral').rhs + sol2 = s*sol1 + C1*exp(-s*Integral(r['b'] - r['d']/s, t)) + elif p ==2: + equ = diff(y(t),t) - r['c']*y(t) - r['d']*s*y(t) + C1*exp(-s*Integral(r['d'] - r['b']/s, t)) + hint1 = classify_ode(equ)[1] + sol2 = dsolve(equ, hint=hint1+'_Integral').rhs + sol1 = s*sol2 + C1*exp(-s*Integral(r['d'] - r['b']/s, t)) + return [Eq(x(t), sol1), Eq(y(t), sol2)] + +def _linear_2eq_order1_type7(x, y, t, r, eq): + r""" + The equations of this type of ode are . + + .. math:: x' = f(t) x + g(t) y + + .. math:: y' = h(t) x + p(t) y + + Differentiating the first equation and substituting the value of `y` + from second equation will give a second-order linear equation + + .. math:: g x'' - (fg + gp + g') x' + (fgp - g^{2} h + f g' - f' g) x = 0 + + This above equation can be easily integrated if following conditions are satisfied. + + 1. `fgp - g^{2} h + f g' - f' g = 0` + + 2. `fgp - g^{2} h + f g' - f' g = ag, fg + gp + g' = bg` + + If first condition is satisfied then it is solved by current dsolve solver and in second case it becomes + a constant coefficient differential equation which is also solved by current solver. + + Otherwise if the above condition fails then, + a particular solution is assumed as `x = x_0(t)` and `y = y_0(t)` + Then the general solution is expressed as + + .. math:: x = C_1 x_0(t) + C_2 x_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt + + .. math:: y = C_1 y_0(t) + C_2 [\frac{F(t) P(t)}{x_0(t)} + y_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt] + + where C1 and C2 are arbitrary constants and + + .. math:: F(t) = e^{\int f(t) \,dt}, P(t) = e^{\int p(t) \,dt} + + """ + C1, C2, C3, C4 = get_numbered_constants(eq, num=4) + e1 = r['a']*r['b']*r['c'] - r['b']**2*r['c'] + r['a']*diff(r['b'],t) - diff(r['a'],t)*r['b'] + e2 = r['a']*r['c']*r['d'] - r['b']*r['c']**2 + diff(r['c'],t)*r['d'] - r['c']*diff(r['d'],t) + m1 = r['a']*r['b'] + r['b']*r['d'] + diff(r['b'],t) + m2 = r['a']*r['c'] + r['c']*r['d'] + diff(r['c'],t) + if e1 == 0: + sol1 = dsolve(r['b']*diff(x(t),t,t) - m1*diff(x(t),t)).rhs + sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs + elif e2 == 0: + sol2 = dsolve(r['c']*diff(y(t),t,t) - m2*diff(y(t),t)).rhs + sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs + elif not (e1/r['b']).has(t) and not (m1/r['b']).has(t): + sol1 = dsolve(diff(x(t),t,t) - (m1/r['b'])*diff(x(t),t) - (e1/r['b'])*x(t)).rhs + sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs + elif not (e2/r['c']).has(t) and not (m2/r['c']).has(t): + sol2 = dsolve(diff(y(t),t,t) - (m2/r['c'])*diff(y(t),t) - (e2/r['c'])*y(t)).rhs + sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs + else: + x0 = Function('x0')(t) # x0 and y0 being particular solutions + y0 = Function('y0')(t) + F = exp(Integral(r['a'],t)) + P = exp(Integral(r['d'],t)) + sol1 = C1*x0 + C2*x0*Integral(r['b']*F*P/x0**2, t) + sol2 = C1*y0 + C2*(F*P/x0 + y0*Integral(r['b']*F*P/x0**2, t)) + return [Eq(x(t), sol1), Eq(y(t), sol2)] + + +def sysode_nonlinear_2eq_order1(match_): + func = match_['func'] + eq = match_['eq'] + fc = match_['func_coeff'] + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + if match_['type_of_equation'] == 'type5': + sol = _nonlinear_2eq_order1_type5(func, t, eq) + return sol + x = func[0].func + y = func[1].func + for i in range(2): + eqs = 0 + for terms in Add.make_args(eq[i]): + eqs += terms/fc[i,func[i],1] + eq[i] = eqs + if match_['type_of_equation'] == 'type1': + sol = _nonlinear_2eq_order1_type1(x, y, t, eq) + elif match_['type_of_equation'] == 'type2': + sol = _nonlinear_2eq_order1_type2(x, y, t, eq) + elif match_['type_of_equation'] == 'type3': + sol = _nonlinear_2eq_order1_type3(x, y, t, eq) + elif match_['type_of_equation'] == 'type4': + sol = _nonlinear_2eq_order1_type4(x, y, t, eq) + return sol + + +def _nonlinear_2eq_order1_type1(x, y, t, eq): + r""" + Equations: + + .. math:: x' = x^n F(x,y) + + .. math:: y' = g(y) F(x,y) + + Solution: + + .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 + + where + + if `n \neq 1` + + .. math:: \varphi = [C_1 + (1-n) \int \frac{1}{g(y)} \,dy]^{\frac{1}{1-n}} + + if `n = 1` + + .. math:: \varphi = C_1 e^{\int \frac{1}{g(y)} \,dy} + + where `C_1` and `C_2` are arbitrary constants. + + """ + C1, C2 = get_numbered_constants(eq, num=2) + n = Wild('n', exclude=[x(t),y(t)]) + f = Wild('f') + u, v = symbols('u, v') + r = eq[0].match(diff(x(t),t) - x(t)**n*f) + g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) + F = r[f].subs(x(t),u).subs(y(t),v) + n = r[n] + if n!=1: + phi = (C1 + (1-n)*Integral(1/g, v))**(1/(1-n)) + else: + phi = C1*exp(Integral(1/g, v)) + phi = phi.doit() + sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v) + sol = [] + for sols in sol2: + sol.append(Eq(x(t),phi.subs(v, sols))) + sol.append(Eq(y(t), sols)) + return sol + +def _nonlinear_2eq_order1_type2(x, y, t, eq): + r""" + Equations: + + .. math:: x' = e^{\lambda x} F(x,y) + + .. math:: y' = g(y) F(x,y) + + Solution: + + .. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2 + + where + + if `\lambda \neq 0` + + .. math:: \varphi = -\frac{1}{\lambda} log(C_1 - \lambda \int \frac{1}{g(y)} \,dy) + + if `\lambda = 0` + + .. math:: \varphi = C_1 + \int \frac{1}{g(y)} \,dy + + where `C_1` and `C_2` are arbitrary constants. + + """ + C1, C2 = get_numbered_constants(eq, num=2) + n = Wild('n', exclude=[x(t),y(t)]) + f = Wild('f') + u, v = symbols('u, v') + r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f) + g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v) + F = r[f].subs(x(t),u).subs(y(t),v) + n = r[n] + if n: + phi = -1/n*log(C1 - n*Integral(1/g, v)) + else: + phi = C1 + Integral(1/g, v) + phi = phi.doit() + sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v) + sol = [] + for sols in sol2: + sol.append(Eq(x(t),phi.subs(v, sols))) + sol.append(Eq(y(t), sols)) + return sol + +def _nonlinear_2eq_order1_type3(x, y, t, eq): + r""" + Autonomous system of general form + + .. math:: x' = F(x,y) + + .. math:: y' = G(x,y) + + Assuming `y = y(x, C_1)` where `C_1` is an arbitrary constant is the general + solution of the first-order equation + + .. math:: F(x,y) y'_x = G(x,y) + + Then the general solution of the original system of equations has the form + + .. math:: \int \frac{1}{F(x,y(x,C_1))} \,dx = t + C_1 + + """ + C1, C2, C3, C4 = get_numbered_constants(eq, num=4) + v = Function('v') + u = Symbol('u') + f = Wild('f') + g = Wild('g') + r1 = eq[0].match(diff(x(t),t) - f) + r2 = eq[1].match(diff(y(t),t) - g) + F = r1[f].subs(x(t), u).subs(y(t), v(u)) + G = r2[g].subs(x(t), u).subs(y(t), v(u)) + sol2r = dsolve(Eq(diff(v(u), u), G/F)) + if isinstance(sol2r, Equality): + sol2r = [sol2r] + for sol2s in sol2r: + sol1 = solve(Integral(1/F.subs(v(u), sol2s.rhs), u).doit() - t - C2, u) + sol = [] + for sols in sol1: + sol.append(Eq(x(t), sols)) + sol.append(Eq(y(t), (sol2s.rhs).subs(u, sols))) + return sol + +def _nonlinear_2eq_order1_type4(x, y, t, eq): + r""" + Equation: + + .. math:: x' = f_1(x) g_1(y) \phi(x,y,t) + + .. math:: y' = f_2(x) g_2(y) \phi(x,y,t) + + First integral: + + .. math:: \int \frac{f_2(x)}{f_1(x)} \,dx - \int \frac{g_1(y)}{g_2(y)} \,dy = C + + where `C` is an arbitrary constant. + + On solving the first integral for `x` (resp., `y` ) and on substituting the + resulting expression into either equation of the original solution, one + arrives at a first-order equation for determining `y` (resp., `x` ). + + """ + C1, C2 = get_numbered_constants(eq, num=2) + u, v = symbols('u, v') + U, V = symbols('U, V', cls=Function) + f = Wild('f') + g = Wild('g') + f1 = Wild('f1', exclude=[v,t]) + f2 = Wild('f2', exclude=[v,t]) + g1 = Wild('g1', exclude=[u,t]) + g2 = Wild('g2', exclude=[u,t]) + r1 = eq[0].match(diff(x(t),t) - f) + r2 = eq[1].match(diff(y(t),t) - g) + num, den = ( + (r1[f].subs(x(t),u).subs(y(t),v))/ + (r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom() + R1 = num.match(f1*g1) + R2 = den.match(f2*g2) + phi = (r1[f].subs(x(t),u).subs(y(t),v))/num + F1 = R1[f1]; F2 = R2[f2] + G1 = R1[g1]; G2 = R2[g2] + sol1r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, u) + sol2r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, v) + sol = [] + for sols in sol1r: + sol.append(Eq(y(t), dsolve(diff(V(t),t) - F2.subs(u,sols).subs(v,V(t))*G2.subs(v,V(t))*phi.subs(u,sols).subs(v,V(t))).rhs)) + for sols in sol2r: + sol.append(Eq(x(t), dsolve(diff(U(t),t) - F1.subs(u,U(t))*G1.subs(v,sols).subs(u,U(t))*phi.subs(v,sols).subs(u,U(t))).rhs)) + return set(sol) + +def _nonlinear_2eq_order1_type5(func, t, eq): + r""" + Clairaut system of ODEs + + .. math:: x = t x' + F(x',y') + + .. math:: y = t y' + G(x',y') + + The following are solutions of the system + + `(i)` straight lines: + + .. math:: x = C_1 t + F(C_1, C_2), y = C_2 t + G(C_1, C_2) + + where `C_1` and `C_2` are arbitrary constants; + + `(ii)` envelopes of the above lines; + + `(iii)` continuously differentiable lines made up from segments of the lines + `(i)` and `(ii)`. + + """ + C1, C2 = get_numbered_constants(eq, num=2) + f = Wild('f') + g = Wild('g') + def check_type(x, y): + r1 = eq[0].match(t*diff(x(t),t) - x(t) + f) + r2 = eq[1].match(t*diff(y(t),t) - y(t) + g) + if not (r1 and r2): + r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t) + r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t) + if not (r1 and r2): + r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f) + r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g) + if not (r1 and r2): + r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t) + r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t) + return [r1, r2] + for func_ in func: + if isinstance(func_, list): + x = func[0][0].func + y = func[0][1].func + [r1, r2] = check_type(x, y) + if not (r1 and r2): + [r1, r2] = check_type(y, x) + x, y = y, x + x1 = diff(x(t),t); y1 = diff(y(t),t) + return {Eq(x(t), C1*t + r1[f].subs(x1,C1).subs(y1,C2)), Eq(y(t), C2*t + r2[g].subs(x1,C1).subs(y1,C2))} + +def sysode_nonlinear_3eq_order1(match_): + x = match_['func'][0].func + y = match_['func'][1].func + z = match_['func'][2].func + eq = match_['eq'] + t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0] + if match_['type_of_equation'] == 'type1': + sol = _nonlinear_3eq_order1_type1(x, y, z, t, eq) + if match_['type_of_equation'] == 'type2': + sol = _nonlinear_3eq_order1_type2(x, y, z, t, eq) + if match_['type_of_equation'] == 'type3': + sol = _nonlinear_3eq_order1_type3(x, y, z, t, eq) + if match_['type_of_equation'] == 'type4': + sol = _nonlinear_3eq_order1_type4(x, y, z, t, eq) + if match_['type_of_equation'] == 'type5': + sol = _nonlinear_3eq_order1_type5(x, y, z, t, eq) + return sol + +def _nonlinear_3eq_order1_type1(x, y, z, t, eq): + r""" + Equations: + + .. math:: a x' = (b - c) y z, \enspace b y' = (c - a) z x, \enspace c z' = (a - b) x y + + First Integrals: + + .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 + + .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 + + where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and + `z` and on substituting the resulting expressions into the first equation of the + system, we arrives at a separable first-order equation on `x`. Similarly doing that + for other two equations, we will arrive at first order equation on `y` and `z` too. + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode0401.pdf + + """ + C1, C2 = get_numbered_constants(eq, num=2) + u, v, w = symbols('u, v, w') + p = Wild('p', exclude=[x(t), y(t), z(t), t]) + q = Wild('q', exclude=[x(t), y(t), z(t), t]) + s = Wild('s', exclude=[x(t), y(t), z(t), t]) + r = (diff(x(t),t) - eq[0]).match(p*y(t)*z(t)) + r.update((diff(y(t),t) - eq[1]).match(q*z(t)*x(t))) + r.update((diff(z(t),t) - eq[2]).match(s*x(t)*y(t))) + n1, d1 = r[p].as_numer_denom() + n2, d2 = r[q].as_numer_denom() + n3, d3 = r[s].as_numer_denom() + val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, d3*u-d3*v-n3*w],[u,v]) + vals = [val[v], val[u]] + c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) + b = vals[0].subs(w, c) + a = vals[1].subs(w, c) + y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b))) + z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c))) + z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c))) + x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a))) + x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a))) + y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b))) + sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x) + sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y) + sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z) + return [sol1, sol2, sol3] + + +def _nonlinear_3eq_order1_type2(x, y, z, t, eq): + r""" + Equations: + + .. math:: a x' = (b - c) y z f(x, y, z, t) + + .. math:: b y' = (c - a) z x f(x, y, z, t) + + .. math:: c z' = (a - b) x y f(x, y, z, t) + + First Integrals: + + .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 + + .. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2 + + where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and + `z` and on substituting the resulting expressions into the first equation of the + system, we arrives at a first-order differential equations on `x`. Similarly doing + that for other two equations we will arrive at first order equation on `y` and `z`. + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode0402.pdf + + """ + C1, C2 = get_numbered_constants(eq, num=2) + u, v, w = symbols('u, v, w') + p = Wild('p', exclude=[x(t), y(t), z(t), t]) + q = Wild('q', exclude=[x(t), y(t), z(t), t]) + s = Wild('s', exclude=[x(t), y(t), z(t), t]) + f = Wild('f') + r1 = (diff(x(t),t) - eq[0]).match(y(t)*z(t)*f) + r = collect_const(r1[f]).match(p*f) + r.update(((diff(y(t),t) - eq[1])/r[f]).match(q*z(t)*x(t))) + r.update(((diff(z(t),t) - eq[2])/r[f]).match(s*x(t)*y(t))) + n1, d1 = r[p].as_numer_denom() + n2, d2 = r[q].as_numer_denom() + n3, d3 = r[s].as_numer_denom() + val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, -d3*u+d3*v+n3*w],[u,v]) + vals = [val[v], val[u]] + c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1]) + a = vals[0].subs(w, c) + b = vals[1].subs(w, c) + y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b))) + z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c))) + z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c))) + x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a))) + x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a))) + y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b))) + sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x*r[f]) + sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y*r[f]) + sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z*r[f]) + return [sol1, sol2, sol3] + +def _nonlinear_3eq_order1_type3(x, y, z, t, eq): + r""" + Equations: + + .. math:: x' = c F_2 - b F_3, \enspace y' = a F_3 - c F_1, \enspace z' = b F_1 - a F_2 + + where `F_n = F_n(x, y, z, t)`. + + 1. First Integral: + + .. math:: a x + b y + c z = C_1, + + where C is an arbitrary constant. + + 2. If we assume function `F_n` to be independent of `t`,i.e, `F_n` = `F_n (x, y, z)` + Then, on eliminating `t` and `z` from the first two equation of the system, one + arrives at the first-order equation + + .. math:: \frac{dy}{dx} = \frac{a F_3 (x, y, z) - c F_1 (x, y, z)}{c F_2 (x, y, z) - + b F_3 (x, y, z)} + + where `z = \frac{1}{c} (C_1 - a x - b y)` + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode0404.pdf + + """ + C1 = get_numbered_constants(eq, num=1) + u, v, w = symbols('u, v, w') + fu, fv, fw = symbols('u, v, w', cls=Function) + p = Wild('p', exclude=[x(t), y(t), z(t), t]) + q = Wild('q', exclude=[x(t), y(t), z(t), t]) + s = Wild('s', exclude=[x(t), y(t), z(t), t]) + F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) + r1 = (diff(x(t), t) - eq[0]).match(F2-F3) + r = collect_const(r1[F2]).match(s*F2) + r.update(collect_const(r1[F3]).match(q*F3)) + if eq[1].has(r[F2]) and not eq[1].has(r[F3]): + r[F2], r[F3] = r[F3], r[F2] + r[s], r[q] = -r[q], -r[s] + r.update((diff(y(t), t) - eq[1]).match(p*r[F3] - r[s]*F1)) + a = r[p]; b = r[q]; c = r[s] + F1 = r[F1].subs(x(t), u).subs(y(t),v).subs(z(t), w) + F2 = r[F2].subs(x(t), u).subs(y(t),v).subs(z(t), w) + F3 = r[F3].subs(x(t), u).subs(y(t),v).subs(z(t), w) + z_xy = (C1-a*u-b*v)/c + y_zx = (C1-a*u-c*w)/b + x_yz = (C1-b*v-c*w)/a + y_x = dsolve(diff(fv(u),u) - ((a*F3-c*F1)/(c*F2-b*F3)).subs(w,z_xy).subs(v,fv(u))).rhs + z_x = dsolve(diff(fw(u),u) - ((b*F1-a*F2)/(c*F2-b*F3)).subs(v,y_zx).subs(w,fw(u))).rhs + z_y = dsolve(diff(fw(v),v) - ((b*F1-a*F2)/(a*F3-c*F1)).subs(u,x_yz).subs(w,fw(v))).rhs + x_y = dsolve(diff(fu(v),v) - ((c*F2-b*F3)/(a*F3-c*F1)).subs(w,z_xy).subs(u,fu(v))).rhs + y_z = dsolve(diff(fv(w),w) - ((a*F3-c*F1)/(b*F1-a*F2)).subs(u,x_yz).subs(v,fv(w))).rhs + x_z = dsolve(diff(fu(w),w) - ((c*F2-b*F3)/(b*F1-a*F2)).subs(v,y_zx).subs(u,fu(w))).rhs + sol1 = dsolve(diff(fu(t),t) - (c*F2 - b*F3).subs(v,y_x).subs(w,z_x).subs(u,fu(t))).rhs + sol2 = dsolve(diff(fv(t),t) - (a*F3 - c*F1).subs(u,x_y).subs(w,z_y).subs(v,fv(t))).rhs + sol3 = dsolve(diff(fw(t),t) - (b*F1 - a*F2).subs(u,x_z).subs(v,y_z).subs(w,fw(t))).rhs + return [sol1, sol2, sol3] + +def _nonlinear_3eq_order1_type4(x, y, z, t, eq): + r""" + Equations: + + .. math:: x' = c z F_2 - b y F_3, \enspace y' = a x F_3 - c z F_1, \enspace z' = b y F_1 - a x F_2 + + where `F_n = F_n (x, y, z, t)` + + 1. First integral: + + .. math:: a x^{2} + b y^{2} + c z^{2} = C_1 + + where `C` is an arbitrary constant. + + 2. Assuming the function `F_n` is independent of `t`: `F_n = F_n (x, y, z)`. Then on + eliminating `t` and `z` from the first two equations of the system, one arrives at + the first-order equation + + .. math:: \frac{dy}{dx} = \frac{a x F_3 (x, y, z) - c z F_1 (x, y, z)} + {c z F_2 (x, y, z) - b y F_3 (x, y, z)} + + where `z = \pm \sqrt{\frac{1}{c} (C_1 - a x^{2} - b y^{2})}` + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode0405.pdf + + """ + C1 = get_numbered_constants(eq, num=1) + u, v, w = symbols('u, v, w') + p = Wild('p', exclude=[x(t), y(t), z(t), t]) + q = Wild('q', exclude=[x(t), y(t), z(t), t]) + s = Wild('s', exclude=[x(t), y(t), z(t), t]) + F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) + r1 = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3) + r = collect_const(r1[F2]).match(s*F2) + r.update(collect_const(r1[F3]).match(q*F3)) + if eq[1].has(r[F2]) and not eq[1].has(r[F3]): + r[F2], r[F3] = r[F3], r[F2] + r[s], r[q] = -r[q], -r[s] + r.update((diff(y(t),t) - eq[1]).match(p*x(t)*r[F3] - r[s]*z(t)*F1)) + a = r[p]; b = r[q]; c = r[s] + F1 = r[F1].subs(x(t),u).subs(y(t),v).subs(z(t),w) + F2 = r[F2].subs(x(t),u).subs(y(t),v).subs(z(t),w) + F3 = r[F3].subs(x(t),u).subs(y(t),v).subs(z(t),w) + x_yz = sqrt((C1 - b*v**2 - c*w**2)/a) + y_zx = sqrt((C1 - c*w**2 - a*u**2)/b) + z_xy = sqrt((C1 - a*u**2 - b*v**2)/c) + y_x = dsolve(diff(v(u),u) - ((a*u*F3-c*w*F1)/(c*w*F2-b*v*F3)).subs(w,z_xy).subs(v,v(u))).rhs + z_x = dsolve(diff(w(u),u) - ((b*v*F1-a*u*F2)/(c*w*F2-b*v*F3)).subs(v,y_zx).subs(w,w(u))).rhs + z_y = dsolve(diff(w(v),v) - ((b*v*F1-a*u*F2)/(a*u*F3-c*w*F1)).subs(u,x_yz).subs(w,w(v))).rhs + x_y = dsolve(diff(u(v),v) - ((c*w*F2-b*v*F3)/(a*u*F3-c*w*F1)).subs(w,z_xy).subs(u,u(v))).rhs + y_z = dsolve(diff(v(w),w) - ((a*u*F3-c*w*F1)/(b*v*F1-a*u*F2)).subs(u,x_yz).subs(v,v(w))).rhs + x_z = dsolve(diff(u(w),w) - ((c*w*F2-b*v*F3)/(b*v*F1-a*u*F2)).subs(v,y_zx).subs(u,u(w))).rhs + sol1 = dsolve(diff(u(t),t) - (c*w*F2 - b*v*F3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs + sol2 = dsolve(diff(v(t),t) - (a*u*F3 - c*w*F1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs + sol3 = dsolve(diff(w(t),t) - (b*v*F1 - a*u*F2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs + return [sol1, sol2, sol3] + +def _nonlinear_3eq_order1_type5(x, y, z, t, eq): + r""" + .. math:: x' = x (c F_2 - b F_3), \enspace y' = y (a F_3 - c F_1), \enspace z' = z (b F_1 - a F_2) + + where `F_n = F_n (x, y, z, t)` and are arbitrary functions. + + First Integral: + + .. math:: \left|x\right|^{a} \left|y\right|^{b} \left|z\right|^{c} = C_1 + + where `C` is an arbitrary constant. If the function `F_n` is independent of `t`, + then, by eliminating `t` and `z` from the first two equations of the system, one + arrives at a first-order equation. + + References + ========== + -https://eqworld.ipmnet.ru/en/solutions/sysode/sode0406.pdf + + """ + C1 = get_numbered_constants(eq, num=1) + u, v, w = symbols('u, v, w') + fu, fv, fw = symbols('u, v, w', cls=Function) + p = Wild('p', exclude=[x(t), y(t), z(t), t]) + q = Wild('q', exclude=[x(t), y(t), z(t), t]) + s = Wild('s', exclude=[x(t), y(t), z(t), t]) + F1, F2, F3 = symbols('F1, F2, F3', cls=Wild) + r1 = eq[0].match(diff(x(t), t) - x(t)*F2 + x(t)*F3) + r = collect_const(r1[F2]).match(s*F2) + r.update(collect_const(r1[F3]).match(q*F3)) + if eq[1].has(r[F2]) and not eq[1].has(r[F3]): + r[F2], r[F3] = r[F3], r[F2] + r[s], r[q] = -r[q], -r[s] + r.update((diff(y(t), t) - eq[1]).match(y(t)*(p*r[F3] - r[s]*F1))) + a = r[p]; b = r[q]; c = r[s] + F1 = r[F1].subs(x(t), u).subs(y(t), v).subs(z(t), w) + F2 = r[F2].subs(x(t), u).subs(y(t), v).subs(z(t), w) + F3 = r[F3].subs(x(t), u).subs(y(t), v).subs(z(t), w) + x_yz = (C1*v**-b*w**-c)**-a + y_zx = (C1*w**-c*u**-a)**-b + z_xy = (C1*u**-a*v**-b)**-c + y_x = dsolve(diff(fv(u), u) - ((v*(a*F3 - c*F1))/(u*(c*F2 - b*F3))).subs(w, z_xy).subs(v, fv(u))).rhs + z_x = dsolve(diff(fw(u), u) - ((w*(b*F1 - a*F2))/(u*(c*F2 - b*F3))).subs(v, y_zx).subs(w, fw(u))).rhs + z_y = dsolve(diff(fw(v), v) - ((w*(b*F1 - a*F2))/(v*(a*F3 - c*F1))).subs(u, x_yz).subs(w, fw(v))).rhs + x_y = dsolve(diff(fu(v), v) - ((u*(c*F2 - b*F3))/(v*(a*F3 - c*F1))).subs(w, z_xy).subs(u, fu(v))).rhs + y_z = dsolve(diff(fv(w), w) - ((v*(a*F3 - c*F1))/(w*(b*F1 - a*F2))).subs(u, x_yz).subs(v, fv(w))).rhs + x_z = dsolve(diff(fu(w), w) - ((u*(c*F2 - b*F3))/(w*(b*F1 - a*F2))).subs(v, y_zx).subs(u, fu(w))).rhs + sol1 = dsolve(diff(fu(t), t) - (u*(c*F2 - b*F3)).subs(v, y_x).subs(w, z_x).subs(u, fu(t))).rhs + sol2 = dsolve(diff(fv(t), t) - (v*(a*F3 - c*F1)).subs(u, x_y).subs(w, z_y).subs(v, fv(t))).rhs + sol3 = dsolve(diff(fw(t), t) - (w*(b*F1 - a*F2)).subs(u, x_z).subs(v, y_z).subs(w, fw(t))).rhs + return [sol1, sol2, sol3] + + +#This import is written at the bottom to avoid circular imports. +from .single import SingleODEProblem, SingleODESolver, solver_map diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/riccati.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/riccati.py new file mode 100644 index 0000000000000000000000000000000000000000..2ef66ed0896d39bee8fba1b74a0c93734742fc1f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/riccati.py @@ -0,0 +1,893 @@ +r""" +This module contains :py:meth:`~sympy.solvers.ode.riccati.solve_riccati`, +a function which gives all rational particular solutions to first order +Riccati ODEs. A general first order Riccati ODE is given by - + +.. math:: y' = b_0(x) + b_1(x)w + b_2(x)w^2 + +where `b_0, b_1` and `b_2` can be arbitrary rational functions of `x` +with `b_2 \ne 0`. When `b_2 = 0`, the equation is not a Riccati ODE +anymore and becomes a Linear ODE. Similarly, when `b_0 = 0`, the equation +is a Bernoulli ODE. The algorithm presented below can find rational +solution(s) to all ODEs with `b_2 \ne 0` that have a rational solution, +or prove that no rational solution exists for the equation. + +Background +========== + +A Riccati equation can be transformed to its normal form + +.. math:: y' + y^2 = a(x) + +using the transformation + +.. math:: y = -b_2(x) - \frac{b'_2(x)}{2 b_2(x)} - \frac{b_1(x)}{2} + +where `a(x)` is given by + +.. math:: a(x) = \frac{1}{4}\left(\frac{b_2'}{b_2} + b_1\right)^2 - \frac{1}{2}\left(\frac{b_2'}{b_2} + b_1\right)' - b_0 b_2 + +Thus, we can develop an algorithm to solve for the Riccati equation +in its normal form, which would in turn give us the solution for +the original Riccati equation. + +Algorithm +========= + +The algorithm implemented here is presented in the Ph.D thesis +"Rational and Algebraic Solutions of First-Order Algebraic ODEs" +by N. Thieu Vo. The entire thesis can be found here - +https://www3.risc.jku.at/publications/download/risc_5387/PhDThesisThieu.pdf + +We have only implemented the Rational Riccati solver (Algorithm 11, +Pg 78-82 in Thesis). Before we proceed towards the implementation +of the algorithm, a few definitions to understand are - + +1. Valuation of a Rational Function at `\infty`: + The valuation of a rational function `p(x)` at `\infty` is equal + to the difference between the degree of the denominator and the + numerator of `p(x)`. + + NOTE: A general definition of valuation of a rational function + at any value of `x` can be found in Pg 63 of the thesis, but + is not of any interest for this algorithm. + +2. Zeros and Poles of a Rational Function: + Let `a(x) = \frac{S(x)}{T(x)}, T \ne 0` be a rational function + of `x`. Then - + + a. The Zeros of `a(x)` are the roots of `S(x)`. + b. The Poles of `a(x)` are the roots of `T(x)`. However, `\infty` + can also be a pole of a(x). We say that `a(x)` has a pole at + `\infty` if `a(\frac{1}{x})` has a pole at 0. + +Every pole is associated with an order that is equal to the multiplicity +of its appearance as a root of `T(x)`. A pole is called a simple pole if +it has an order 1. Similarly, a pole is called a multiple pole if it has +an order `\ge` 2. + +Necessary Conditions +==================== + +For a Riccati equation in its normal form, + +.. math:: y' + y^2 = a(x) + +we can define + +a. A pole is called a movable pole if it is a pole of `y(x)` and is not +a pole of `a(x)`. +b. Similarly, a pole is called a non-movable pole if it is a pole of both +`y(x)` and `a(x)`. + +Then, the algorithm states that a rational solution exists only if - + +a. Every pole of `a(x)` must be either a simple pole or a multiple pole +of even order. +b. The valuation of `a(x)` at `\infty` must be even or be `\ge` 2. + +This algorithm finds all possible rational solutions for the Riccati ODE. +If no rational solutions are found, it means that no rational solutions +exist. + +The algorithm works for Riccati ODEs where the coefficients are rational +functions in the independent variable `x` with rational number coefficients +i.e. in `Q(x)`. The coefficients in the rational function cannot be floats, +irrational numbers, symbols or any other kind of expression. The reasons +for this are - + +1. When using symbols, different symbols could take the same value and this +would affect the multiplicity of poles if symbols are present here. + +2. An integer degree bound is required to calculate a polynomial solution +to an auxiliary differential equation, which in turn gives the particular +solution for the original ODE. If symbols/floats/irrational numbers are +present, we cannot determine if the expression for the degree bound is an +integer or not. + +Solution +======== + +With these definitions, we can state a general form for the solution of +the equation. `y(x)` must have the form - + +.. math:: y(x) = \sum_{i=1}^{n} \sum_{j=1}^{r_i} \frac{c_{ij}}{(x - x_i)^j} + \sum_{i=1}^{m} \frac{1}{x - \chi_i} + \sum_{i=0}^{N} d_i x^i + +where `x_1, x_2, \dots, x_n` are non-movable poles of `a(x)`, +`\chi_1, \chi_2, \dots, \chi_m` are movable poles of `a(x)`, and the values +of `N, n, r_1, r_2, \dots, r_n` can be determined from `a(x)`. The +coefficient vectors `(d_0, d_1, \dots, d_N)` and `(c_{i1}, c_{i2}, \dots, c_{i r_i})` +can be determined from `a(x)`. We will have 2 choices each of these vectors +and part of the procedure is figuring out which of the 2 should be used +to get the solution correctly. + +Implementation +============== + +In this implementation, we use ``Poly`` to represent a rational function +rather than using ``Expr`` since ``Poly`` is much faster. Since we cannot +represent rational functions directly using ``Poly``, we instead represent +a rational function with 2 ``Poly`` objects - one for its numerator and +the other for its denominator. + +The code is written to match the steps given in the thesis (Pg 82) + +Step 0 : Match the equation - +Find `b_0, b_1` and `b_2`. If `b_2 = 0` or no such functions exist, raise +an error + +Step 1 : Transform the equation to its normal form as explained in the +theory section. + +Step 2 : Initialize an empty set of solutions, ``sol``. + +Step 3 : If `a(x) = 0`, append `\frac{1}/{(x - C1)}` to ``sol``. + +Step 4 : If `a(x)` is a rational non-zero number, append `\pm \sqrt{a}` +to ``sol``. + +Step 5 : Find the poles and their multiplicities of `a(x)`. Let +the number of poles be `n`. Also find the valuation of `a(x)` at +`\infty` using ``val_at_inf``. + +NOTE: Although the algorithm considers `\infty` as a pole, it is +not mentioned if it a part of the set of finite poles. `\infty` +is NOT a part of the set of finite poles. If a pole exists at +`\infty`, we use its multiplicity to find the laurent series of +`a(x)` about `\infty`. + +Step 6 : Find `n` c-vectors (one for each pole) and 1 d-vector using +``construct_c`` and ``construct_d``. Now, determine all the ``2**(n + 1)`` +combinations of choosing between 2 choices for each of the `n` c-vectors +and 1 d-vector. + +NOTE: The equation for `d_{-1}` in Case 4 (Pg 80) has a printinig +mistake. The term `- d_N` must be replaced with `-N d_N`. The same +has been explained in the code as well. + +For each of these above combinations, do + +Step 8 : Compute `m` in ``compute_m_ybar``. `m` is the degree bound of +the polynomial solution we must find for the auxiliary equation. + +Step 9 : In ``compute_m_ybar``, compute ybar as well where ``ybar`` is +one part of y(x) - + +.. math:: \overline{y}(x) = \sum_{i=1}^{n} \sum_{j=1}^{r_i} \frac{c_{ij}}{(x - x_i)^j} + \sum_{i=0}^{N} d_i x^i + +Step 10 : If `m` is a non-negative integer - + +Step 11: Find a polynomial solution of degree `m` for the auxiliary equation. + +There are 2 cases possible - + + a. `m` is a non-negative integer: We can solve for the coefficients + in `p(x)` using Undetermined Coefficients. + + b. `m` is not a non-negative integer: In this case, we cannot find + a polynomial solution to the auxiliary equation, and hence, we ignore + this value of `m`. + +Step 12 : For each `p(x)` that exists, append `ybar + \frac{p'(x)}{p(x)}` +to ``sol``. + +Step 13 : For each solution in ``sol``, apply an inverse transformation, +so that the solutions of the original equation are found using the +solutions of the equation in its normal form. +""" + + +from itertools import product +from sympy.core import S +from sympy.core.add import Add +from sympy.core.numbers import oo, Float +from sympy.core.function import count_ops +from sympy.core.relational import Eq +from sympy.core.symbol import symbols, Symbol, Dummy +from sympy.functions import sqrt, exp +from sympy.functions.elementary.complexes import sign +from sympy.integrals.integrals import Integral +from sympy.polys.domains import ZZ +from sympy.polys.polytools import Poly +from sympy.polys.polyroots import roots +from sympy.solvers.solveset import linsolve + + +def riccati_normal(w, x, b1, b2): + """ + Given a solution `w(x)` to the equation + + .. math:: w'(x) = b_0(x) + b_1(x)*w(x) + b_2(x)*w(x)^2 + + and rational function coefficients `b_1(x)` and + `b_2(x)`, this function transforms the solution to + give a solution `y(x)` for its corresponding normal + Riccati ODE + + .. math:: y'(x) + y(x)^2 = a(x) + + using the transformation + + .. math:: y(x) = -b_2(x)*w(x) - b'_2(x)/(2*b_2(x)) - b_1(x)/2 + """ + return -b2*w - b2.diff(x)/(2*b2) - b1/2 + + +def riccati_inverse_normal(y, x, b1, b2, bp=None): + """ + Inverse transforming the solution to the normal + Riccati ODE to get the solution to the Riccati ODE. + """ + # bp is the expression which is independent of the solution + # and hence, it need not be computed again + if bp is None: + bp = -b2.diff(x)/(2*b2**2) - b1/(2*b2) + # w(x) = -y(x)/b2(x) - b2'(x)/(2*b2(x)^2) - b1(x)/(2*b2(x)) + return -y/b2 + bp + + +def riccati_reduced(eq, f, x): + """ + Convert a Riccati ODE into its corresponding + normal Riccati ODE. + """ + match, funcs = match_riccati(eq, f, x) + # If equation is not a Riccati ODE, exit + if not match: + return False + # Using the rational functions, find the expression for a(x) + b0, b1, b2 = funcs + a = -b0*b2 + b1**2/4 - b1.diff(x)/2 + 3*b2.diff(x)**2/(4*b2**2) + b1*b2.diff(x)/(2*b2) - \ + b2.diff(x, 2)/(2*b2) + # Normal form of Riccati ODE is f'(x) + f(x)^2 = a(x) + return f(x).diff(x) + f(x)**2 - a + +def linsolve_dict(eq, syms): + """ + Get the output of linsolve as a dict + """ + # Convert tuple type return value of linsolve + # to a dictionary for ease of use + sol = linsolve(eq, syms) + if not sol: + return {} + return dict(zip(syms, list(sol)[0])) + + +def match_riccati(eq, f, x): + """ + A function that matches and returns the coefficients + if an equation is a Riccati ODE + + Parameters + ========== + + eq: Equation to be matched + f: Dependent variable + x: Independent variable + + Returns + ======= + + match: True if equation is a Riccati ODE, False otherwise + funcs: [b0, b1, b2] if match is True, [] otherwise. Here, + b0, b1 and b2 are rational functions which match the equation. + """ + # Group terms based on f(x) + if isinstance(eq, Eq): + eq = eq.lhs - eq.rhs + eq = eq.expand().collect(f(x)) + cf = eq.coeff(f(x).diff(x)) + + # There must be an f(x).diff(x) term. + # eq must be an Add object since we are using the expanded + # equation and it must have atleast 2 terms (b2 != 0) + if cf != 0 and isinstance(eq, Add): + + # Divide all coefficients by the coefficient of f(x).diff(x) + # and add the terms again to get the same equation + eq = Add(*((x/cf).cancel() for x in eq.args)).collect(f(x)) + + # Match the equation with the pattern + b1 = -eq.coeff(f(x)) + b2 = -eq.coeff(f(x)**2) + b0 = (f(x).diff(x) - b1*f(x) - b2*f(x)**2 - eq).expand() + funcs = [b0, b1, b2] + + # Check if coefficients are not symbols and floats + if any(len(x.atoms(Symbol)) > 1 or len(x.atoms(Float)) for x in funcs): + return False, [] + + # If b_0(x) contains f(x), it is not a Riccati ODE + if len(b0.atoms(f)) or not all((b2 != 0, b0.is_rational_function(x), + b1.is_rational_function(x), b2.is_rational_function(x))): + return False, [] + return True, funcs + return False, [] + + +def val_at_inf(num, den, x): + # Valuation of a rational function at oo = deg(denom) - deg(numer) + return den.degree(x) - num.degree(x) + + +def check_necessary_conds(val_inf, muls): + """ + The necessary conditions for a rational solution + to exist are as follows - + + i) Every pole of a(x) must be either a simple pole + or a multiple pole of even order. + + ii) The valuation of a(x) at infinity must be even + or be greater than or equal to 2. + + Here, a simple pole is a pole with multiplicity 1 + and a multiple pole is a pole with multiplicity + greater than 1. + """ + return (val_inf >= 2 or (val_inf <= 0 and val_inf%2 == 0)) and \ + all(mul == 1 or (mul%2 == 0 and mul >= 2) for mul in muls) + + +def inverse_transform_poly(num, den, x): + """ + A function to make the substitution + x -> 1/x in a rational function that + is represented using Poly objects for + numerator and denominator. + """ + # Declare for reuse + one = Poly(1, x) + xpoly = Poly(x, x) + + # Check if degree of numerator is same as denominator + pwr = val_at_inf(num, den, x) + if pwr >= 0: + # Denominator has greater degree. Substituting x with + # 1/x would make the extra power go to the numerator + if num.expr != 0: + num = num.transform(one, xpoly) * x**pwr + den = den.transform(one, xpoly) + else: + # Numerator has greater degree. Substituting x with + # 1/x would make the extra power go to the denominator + num = num.transform(one, xpoly) + den = den.transform(one, xpoly) * x**(-pwr) + return num.cancel(den, include=True) + + +def limit_at_inf(num, den, x): + """ + Find the limit of a rational function + at oo + """ + # pwr = degree(num) - degree(den) + pwr = -val_at_inf(num, den, x) + # Numerator has a greater degree than denominator + # Limit at infinity would depend on the sign of the + # leading coefficients of numerator and denominator + if pwr > 0: + return oo*sign(num.LC()/den.LC()) + # Degree of numerator is equal to that of denominator + # Limit at infinity is just the ratio of leading coeffs + elif pwr == 0: + return num.LC()/den.LC() + # Degree of numerator is less than that of denominator + # Limit at infinity is just 0 + else: + return 0 + + +def construct_c_case_1(num, den, x, pole): + # Find the coefficient of 1/(x - pole)**2 in the + # Laurent series expansion of a(x) about pole. + num1, den1 = (num*Poly((x - pole)**2, x, extension=True)).cancel(den, include=True) + r = (num1.subs(x, pole))/(den1.subs(x, pole)) + + # If multiplicity is 2, the coefficient to be added + # in the c-vector is c = (1 +- sqrt(1 + 4*r))/2 + if r != -S(1)/4: + return [[(1 + sqrt(1 + 4*r))/2], [(1 - sqrt(1 + 4*r))/2]] + return [[S.Half]] + + +def construct_c_case_2(num, den, x, pole, mul): + # Generate the coefficients using the recurrence + # relation mentioned in (5.14) in the thesis (Pg 80) + + # r_i = mul/2 + ri = mul//2 + + # Find the Laurent series coefficients about the pole + ser = rational_laurent_series(num, den, x, pole, mul, 6) + + # Start with an empty memo to store the coefficients + # This is for the plus case + cplus = [0 for i in range(ri)] + + # Base Case + cplus[ri-1] = sqrt(ser[2*ri]) + + # Iterate backwards to find all coefficients + s = ri - 1 + sm = 0 + for s in range(ri-1, 0, -1): + sm = 0 + for j in range(s+1, ri): + sm += cplus[j-1]*cplus[ri+s-j-1] + if s!= 1: + cplus[s-1] = (ser[ri+s] - sm)/(2*cplus[ri-1]) + + # Memo for the minus case + cminus = [-x for x in cplus] + + # Find the 0th coefficient in the recurrence + cplus[0] = (ser[ri+s] - sm - ri*cplus[ri-1])/(2*cplus[ri-1]) + cminus[0] = (ser[ri+s] - sm - ri*cminus[ri-1])/(2*cminus[ri-1]) + + # Add both the plus and minus cases' coefficients + if cplus != cminus: + return [cplus, cminus] + return cplus + + +def construct_c_case_3(): + # If multiplicity is 1, the coefficient to be added + # in the c-vector is 1 (no choice) + return [[1]] + + +def construct_c(num, den, x, poles, muls): + """ + Helper function to calculate the coefficients + in the c-vector for each pole. + """ + c = [] + for pole, mul in zip(poles, muls): + c.append([]) + + # Case 3 + if mul == 1: + # Add the coefficients from Case 3 + c[-1].extend(construct_c_case_3()) + + # Case 1 + elif mul == 2: + # Add the coefficients from Case 1 + c[-1].extend(construct_c_case_1(num, den, x, pole)) + + # Case 2 + else: + # Add the coefficients from Case 2 + c[-1].extend(construct_c_case_2(num, den, x, pole, mul)) + + return c + + +def construct_d_case_4(ser, N): + # Initialize an empty vector + dplus = [0 for i in range(N+2)] + # d_N = sqrt(a_{2*N}) + dplus[N] = sqrt(ser[2*N]) + + # Use the recurrence relations to find + # the value of d_s + for s in range(N-1, -2, -1): + sm = 0 + for j in range(s+1, N): + sm += dplus[j]*dplus[N+s-j] + if s != -1: + dplus[s] = (ser[N+s] - sm)/(2*dplus[N]) + + # Coefficients for the case of d_N = -sqrt(a_{2*N}) + dminus = [-x for x in dplus] + + # The third equation in Eq 5.15 of the thesis is WRONG! + # d_N must be replaced with N*d_N in that equation. + dplus[-1] = (ser[N+s] - N*dplus[N] - sm)/(2*dplus[N]) + dminus[-1] = (ser[N+s] - N*dminus[N] - sm)/(2*dminus[N]) + + if dplus != dminus: + return [dplus, dminus] + return dplus + + +def construct_d_case_5(ser): + # List to store coefficients for plus case + dplus = [0, 0] + + # d_0 = sqrt(a_0) + dplus[0] = sqrt(ser[0]) + + # d_(-1) = a_(-1)/(2*d_0) + dplus[-1] = ser[-1]/(2*dplus[0]) + + # Coefficients for the minus case are just the negative + # of the coefficients for the positive case. + dminus = [-x for x in dplus] + + if dplus != dminus: + return [dplus, dminus] + return dplus + + +def construct_d_case_6(num, den, x): + # s_oo = lim x->0 1/x**2 * a(1/x) which is equivalent to + # s_oo = lim x->oo x**2 * a(x) + s_inf = limit_at_inf(Poly(x**2, x)*num, den, x) + + # d_(-1) = (1 +- sqrt(1 + 4*s_oo))/2 + if s_inf != -S(1)/4: + return [[(1 + sqrt(1 + 4*s_inf))/2], [(1 - sqrt(1 + 4*s_inf))/2]] + return [[S.Half]] + + +def construct_d(num, den, x, val_inf): + """ + Helper function to calculate the coefficients + in the d-vector based on the valuation of the + function at oo. + """ + N = -val_inf//2 + # Multiplicity of oo as a pole + mul = -val_inf if val_inf < 0 else 0 + ser = rational_laurent_series(num, den, x, oo, mul, 1) + + # Case 4 + if val_inf < 0: + d = construct_d_case_4(ser, N) + + # Case 5 + elif val_inf == 0: + d = construct_d_case_5(ser) + + # Case 6 + else: + d = construct_d_case_6(num, den, x) + + return d + + +def rational_laurent_series(num, den, x, r, m, n): + r""" + The function computes the Laurent series coefficients + of a rational function. + + Parameters + ========== + + num: A Poly object that is the numerator of `f(x)`. + den: A Poly object that is the denominator of `f(x)`. + x: The variable of expansion of the series. + r: The point of expansion of the series. + m: Multiplicity of r if r is a pole of `f(x)`. Should + be zero otherwise. + n: Order of the term upto which the series is expanded. + + Returns + ======= + + series: A dictionary that has power of the term as key + and coefficient of that term as value. + + Below is a basic outline of how the Laurent series of a + rational function `f(x)` about `x_0` is being calculated - + + 1. Substitute `x + x_0` in place of `x`. If `x_0` + is a pole of `f(x)`, multiply the expression by `x^m` + where `m` is the multiplicity of `x_0`. Denote the + the resulting expression as g(x). We do this substitution + so that we can now find the Laurent series of g(x) about + `x = 0`. + + 2. We can then assume that the Laurent series of `g(x)` + takes the following form - + + .. math:: g(x) = \frac{num(x)}{den(x)} = \sum_{m = 0}^{\infty} a_m x^m + + where `a_m` denotes the Laurent series coefficients. + + 3. Multiply the denominator to the RHS of the equation + and form a recurrence relation for the coefficients `a_m`. + """ + one = Poly(1, x, extension=True) + + if r == oo: + # Series at x = oo is equal to first transforming + # the function from x -> 1/x and finding the + # series at x = 0 + num, den = inverse_transform_poly(num, den, x) + r = S(0) + + if r: + # For an expansion about a non-zero point, a + # transformation from x -> x + r must be made + num = num.transform(Poly(x + r, x, extension=True), one) + den = den.transform(Poly(x + r, x, extension=True), one) + + # Remove the pole from the denominator if the series + # expansion is about one of the poles + num, den = (num*x**m).cancel(den, include=True) + + # Equate coefficients for the first terms (base case) + maxdegree = 1 + max(num.degree(), den.degree()) + syms = symbols(f'a:{maxdegree}', cls=Dummy) + diff = num - den * Poly(syms[::-1], x) + coeff_diffs = diff.all_coeffs()[::-1][:maxdegree] + (coeffs, ) = linsolve(coeff_diffs, syms) + + # Use the recursion relation for the rest + recursion = den.all_coeffs()[::-1] + div, rec_rhs = recursion[0], recursion[1:] + series = list(coeffs) + while len(series) < n: + next_coeff = Add(*(c*series[-1-n] for n, c in enumerate(rec_rhs))) / div + series.append(-next_coeff) + series = {m - i: val for i, val in enumerate(series)} + return series + +def compute_m_ybar(x, poles, choice, N): + """ + Helper function to calculate - + + 1. m - The degree bound for the polynomial + solution that must be found for the auxiliary + differential equation. + + 2. ybar - Part of the solution which can be + computed using the poles, c and d vectors. + """ + ybar = 0 + m = Poly(choice[-1][-1], x, extension=True) + + # Calculate the first (nested) summation for ybar + # as given in Step 9 of the Thesis (Pg 82) + dybar = [] + for i, polei in enumerate(poles): + for j, cij in enumerate(choice[i]): + dybar.append(cij/(x - polei)**(j + 1)) + m -=Poly(choice[i][0], x, extension=True) # can't accumulate Poly and use with Add + ybar += Add(*dybar) + + # Calculate the second summation for ybar + for i in range(N+1): + ybar += choice[-1][i]*x**i + return (m.expr, ybar) + + +def solve_aux_eq(numa, dena, numy, deny, x, m): + """ + Helper function to find a polynomial solution + of degree m for the auxiliary differential + equation. + """ + # Assume that the solution is of the type + # p(x) = C_0 + C_1*x + ... + C_{m-1}*x**(m-1) + x**m + psyms = symbols(f'C0:{m}', cls=Dummy) + K = ZZ[psyms] + psol = Poly(K.gens, x, domain=K) + Poly(x**m, x, domain=K) + + # Eq (5.16) in Thesis - Pg 81 + auxeq = (dena*(numy.diff(x)*deny - numy*deny.diff(x) + numy**2) - numa*deny**2)*psol + if m >= 1: + px = psol.diff(x) + auxeq += px*(2*numy*deny*dena) + if m >= 2: + auxeq += px.diff(x)*(deny**2*dena) + if m != 0: + # m is a non-zero integer. Find the constant terms using undetermined coefficients + return psol, linsolve_dict(auxeq.all_coeffs(), psyms), True + else: + # m == 0 . Check if 1 (x**0) is a solution to the auxiliary equation + return S.One, auxeq, auxeq == 0 + + +def remove_redundant_sols(sol1, sol2, x): + """ + Helper function to remove redundant + solutions to the differential equation. + """ + # If y1 and y2 are redundant solutions, there is + # some value of the arbitrary constant for which + # they will be equal + + syms1 = sol1.atoms(Symbol, Dummy) + syms2 = sol2.atoms(Symbol, Dummy) + num1, den1 = [Poly(e, x, extension=True) for e in sol1.together().as_numer_denom()] + num2, den2 = [Poly(e, x, extension=True) for e in sol2.together().as_numer_denom()] + # Cross multiply + e = num1*den2 - den1*num2 + # Check if there are any constants + syms = list(e.atoms(Symbol, Dummy)) + if len(syms): + # Find values of constants for which solutions are equal + redn = linsolve(e.all_coeffs(), syms) + if len(redn): + # Return the general solution over a particular solution + if len(syms1) > len(syms2): + return sol2 + # If both have constants, return the lesser complex solution + elif len(syms1) == len(syms2): + return sol1 if count_ops(syms1) >= count_ops(syms2) else sol2 + else: + return sol1 + + +def get_gen_sol_from_part_sol(part_sols, a, x): + """" + Helper function which computes the general + solution for a Riccati ODE from its particular + solutions. + + There are 3 cases to find the general solution + from the particular solutions for a Riccati ODE + depending on the number of particular solution(s) + we have - 1, 2 or 3. + + For more information, see Section 6 of + "Methods of Solution of the Riccati Differential Equation" + by D. R. Haaheim and F. M. Stein + """ + + # If no particular solutions are found, a general + # solution cannot be found + if len(part_sols) == 0: + return [] + + # In case of a single particular solution, the general + # solution can be found by using the substitution + # y = y1 + 1/z and solving a Bernoulli ODE to find z. + elif len(part_sols) == 1: + y1 = part_sols[0] + i = exp(Integral(2*y1, x)) + z = i * Integral(a/i, x) + z = z.doit() + if a == 0 or z == 0: + return y1 + return y1 + 1/z + + # In case of 2 particular solutions, the general solution + # can be found by solving a separable equation. This is + # the most common case, i.e. most Riccati ODEs have 2 + # rational particular solutions. + elif len(part_sols) == 2: + y1, y2 = part_sols + # One of them already has a constant + if len(y1.atoms(Dummy)) + len(y2.atoms(Dummy)) > 0: + u = exp(Integral(y2 - y1, x)).doit() + # Introduce a constant + else: + C1 = Dummy('C1') + u = C1*exp(Integral(y2 - y1, x)).doit() + if u == 1: + return y2 + return (y2*u - y1)/(u - 1) + + # In case of 3 particular solutions, a closed form + # of the general solution can be obtained directly + else: + y1, y2, y3 = part_sols[:3] + C1 = Dummy('C1') + return (C1 + 1)*y2*(y1 - y3)/(C1*y1 + y2 - (C1 + 1)*y3) + + +def solve_riccati(fx, x, b0, b1, b2, gensol=False): + """ + The main function that gives particular/general + solutions to Riccati ODEs that have atleast 1 + rational particular solution. + """ + # Step 1 : Convert to Normal Form + a = -b0*b2 + b1**2/4 - b1.diff(x)/2 + 3*b2.diff(x)**2/(4*b2**2) + b1*b2.diff(x)/(2*b2) - \ + b2.diff(x, 2)/(2*b2) + a_t = a.together() + num, den = [Poly(e, x, extension=True) for e in a_t.as_numer_denom()] + num, den = num.cancel(den, include=True) + + # Step 2 + presol = [] + + # Step 3 : a(x) is 0 + if num == 0: + presol.append(1/(x + Dummy('C1'))) + + # Step 4 : a(x) is a non-zero constant + elif x not in num.free_symbols.union(den.free_symbols): + presol.extend([sqrt(a), -sqrt(a)]) + + # Step 5 : Find poles and valuation at infinity + poles = roots(den, x) + poles, muls = list(poles.keys()), list(poles.values()) + val_inf = val_at_inf(num, den, x) + + if len(poles): + # Check necessary conditions (outlined in the module docstring) + if not check_necessary_conds(val_inf, muls): + raise ValueError("Rational Solution doesn't exist") + + # Step 6 + # Construct c-vectors for each singular point + c = construct_c(num, den, x, poles, muls) + + # Construct d vectors for each singular point + d = construct_d(num, den, x, val_inf) + + # Step 7 : Iterate over all possible combinations and return solutions + # For each possible combination, generate an array of 0's and 1's + # where 0 means pick 1st choice and 1 means pick the second choice. + + # NOTE: We could exit from the loop if we find 3 particular solutions, + # but it is not implemented here as - + # a. Finding 3 particular solutions is very rare. Most of the time, + # only 2 particular solutions are found. + # b. In case we exit after finding 3 particular solutions, it might + # happen that 1 or 2 of them are redundant solutions. So, instead of + # spending some more time in computing the particular solutions, + # we will end up computing the general solution from a single + # particular solution which is usually slower than computing the + # general solution from 2 or 3 particular solutions. + c.append(d) + choices = product(*c) + for choice in choices: + m, ybar = compute_m_ybar(x, poles, choice, -val_inf//2) + numy, deny = [Poly(e, x, extension=True) for e in ybar.together().as_numer_denom()] + # Step 10 : Check if a valid solution exists. If yes, also check + # if m is a non-negative integer + if m.is_nonnegative == True and m.is_integer == True: + + # Step 11 : Find polynomial solutions of degree m for the auxiliary equation + psol, coeffs, exists = solve_aux_eq(num, den, numy, deny, x, m) + + # Step 12 : If valid polynomial solution exists, append solution. + if exists: + # m == 0 case + if psol == 1 and coeffs == 0: + # p(x) = 1, so p'(x)/p(x) term need not be added + presol.append(ybar) + # m is a positive integer and there are valid coefficients + elif len(coeffs): + # Substitute the valid coefficients to get p(x) + psol = psol.xreplace(coeffs) + # y(x) = ybar(x) + p'(x)/p(x) + presol.append(ybar + psol.diff(x)/psol) + + # Remove redundant solutions from the list of existing solutions + remove = set() + for i in range(len(presol)): + for j in range(i+1, len(presol)): + rem = remove_redundant_sols(presol[i], presol[j], x) + if rem is not None: + remove.add(rem) + sols = [x for x in presol if x not in remove] + + # Step 15 : Inverse transform the solutions of the equation in normal form + bp = -b2.diff(x)/(2*b2**2) - b1/(2*b2) + + # If general solution is required, compute it from the particular solutions + if gensol: + sols = [get_gen_sol_from_part_sol(sols, a, x)] + + # Inverse transform the particular solutions + presol = [Eq(fx, riccati_inverse_normal(y, x, b1, b2, bp).cancel(extension=True)) for y in sols] + return presol diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/single.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/single.py new file mode 100644 index 0000000000000000000000000000000000000000..c4829acf41293c2f6f20af3e9c45d37457802102 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/single.py @@ -0,0 +1,2977 @@ +# +# This is the module for ODE solver classes for single ODEs. +# + +from __future__ import annotations +from typing import ClassVar, Iterator + +from .riccati import match_riccati, solve_riccati +from sympy.core import Add, S, Pow, Rational +from sympy.core.cache import cached_property +from sympy.core.exprtools import factor_terms +from sympy.core.expr import Expr +from sympy.core.function import AppliedUndef, Derivative, diff, Function, expand, Subs, _mexpand +from sympy.core.numbers import zoo +from sympy.core.relational import Equality, Eq +from sympy.core.symbol import Symbol, Dummy, Wild +from sympy.core.mul import Mul +from sympy.functions import exp, tan, log, sqrt, besselj, bessely, cbrt, airyai, airybi +from sympy.integrals import Integral +from sympy.polys import Poly +from sympy.polys.polytools import cancel, factor, degree +from sympy.simplify import collect, simplify, separatevars, logcombine, posify # type: ignore +from sympy.simplify.radsimp import fraction +from sympy.utilities import numbered_symbols +from sympy.solvers.solvers import solve +from sympy.solvers.deutils import ode_order, _preprocess +from sympy.polys.matrices.linsolve import _lin_eq2dict +from sympy.polys.solvers import PolyNonlinearError +from .hypergeometric import equivalence_hypergeometric, match_2nd_2F1_hypergeometric, \ + get_sol_2F1_hypergeometric, match_2nd_hypergeometric +from .nonhomogeneous import _get_euler_characteristic_eq_sols, _get_const_characteristic_eq_sols, \ + _solve_undetermined_coefficients, _solve_variation_of_parameters, _test_term, _undetermined_coefficients_match, \ + _get_simplified_sol +from .lie_group import _ode_lie_group + + +class ODEMatchError(NotImplementedError): + """Raised if a SingleODESolver is asked to solve an ODE it does not match""" + pass + + +class SingleODEProblem: + """Represents an ordinary differential equation (ODE) + + This class is used internally in the by dsolve and related + functions/classes so that properties of an ODE can be computed + efficiently. + + Examples + ======== + + This class is used internally by dsolve. To instantiate an instance + directly first define an ODE problem: + + >>> from sympy import Function, Symbol + >>> x = Symbol('x') + >>> f = Function('f') + >>> eq = f(x).diff(x, 2) + + Now you can create a SingleODEProblem instance and query its properties: + + >>> from sympy.solvers.ode.single import SingleODEProblem + >>> problem = SingleODEProblem(f(x).diff(x), f(x), x) + >>> problem.eq + Derivative(f(x), x) + >>> problem.func + f(x) + >>> problem.sym + x + """ + + # Instance attributes: + eq: Expr + func: AppliedUndef + sym: Symbol + _order: int + _eq_expanded: Expr + _eq_preprocessed: Expr + _eq_high_order_free = None + + def __init__(self, eq, func, sym, prep=True, **kwargs): + assert isinstance(eq, Expr) + assert isinstance(func, AppliedUndef) + assert isinstance(sym, Symbol) + assert isinstance(prep, bool) + self.eq = eq + self.func = func + self.sym = sym + self.prep = prep + self.params = kwargs + + @cached_property + def order(self) -> int: + return ode_order(self.eq, self.func) + + @cached_property + def eq_preprocessed(self) -> Expr: + return self._get_eq_preprocessed() + + @cached_property + def eq_high_order_free(self) -> Expr: + a = Wild('a', exclude=[self.func]) + c1 = Wild('c1', exclude=[self.sym]) + # Precondition to try remove f(x) from highest order derivative + reduced_eq = None + if self.eq.is_Add: + deriv_coef = self.eq.coeff(self.func.diff(self.sym, self.order)) + if deriv_coef not in (1, 0): + r = deriv_coef.match(a*self.func**c1) + if r and r[c1]: + den = self.func**r[c1] + reduced_eq = Add(*[arg/den for arg in self.eq.args]) + if reduced_eq is None: + reduced_eq = expand(self.eq) + return reduced_eq + + @cached_property + def eq_expanded(self) -> Expr: + return expand(self.eq_preprocessed) + + def _get_eq_preprocessed(self) -> Expr: + if self.prep: + process_eq, process_func = _preprocess(self.eq, self.func) + if process_func != self.func: + raise ValueError + else: + process_eq = self.eq + return process_eq + + def get_numbered_constants(self, num=1, start=1, prefix='C') -> list[Symbol]: + """ + Returns a list of constants that do not occur + in eq already. + """ + ncs = self.iter_numbered_constants(start, prefix) + Cs = [next(ncs) for i in range(num)] + return Cs + + def iter_numbered_constants(self, start=1, prefix='C') -> Iterator[Symbol]: + """ + Returns an iterator of constants that do not occur + in eq already. + """ + atom_set = self.eq.free_symbols + func_set = self.eq.atoms(Function) + if func_set: + atom_set |= {Symbol(str(f.func)) for f in func_set} + return numbered_symbols(start=start, prefix=prefix, exclude=atom_set) + + @cached_property + def is_autonomous(self): + u = Dummy('u') + x = self.sym + syms = self.eq.subs(self.func, u).free_symbols + return x not in syms + + def get_linear_coefficients(self, eq, func, order): + r""" + Matches a differential equation to the linear form: + + .. math:: a_n(x) y^{(n)} + \cdots + a_1(x)y' + a_0(x) y + B(x) = 0 + + Returns a dict of order:coeff terms, where order is the order of the + derivative on each term, and coeff is the coefficient of that derivative. + The key ``-1`` holds the function `B(x)`. Returns ``None`` if the ODE is + not linear. This function assumes that ``func`` has already been checked + to be good. + + Examples + ======== + + >>> from sympy import Function, cos, sin + >>> from sympy.abc import x + >>> from sympy.solvers.ode.single import SingleODEProblem + >>> f = Function('f') + >>> eq = f(x).diff(x, 3) + 2*f(x).diff(x) + \ + ... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) - \ + ... sin(x) + >>> obj = SingleODEProblem(eq, f(x), x) + >>> obj.get_linear_coefficients(eq, f(x), 3) + {-1: x - sin(x), 0: -1, 1: cos(x) + 2, 2: x, 3: 1} + >>> eq = f(x).diff(x, 3) + 2*f(x).diff(x) + \ + ... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) - \ + ... sin(f(x)) + >>> obj = SingleODEProblem(eq, f(x), x) + >>> obj.get_linear_coefficients(eq, f(x), 3) == None + True + + """ + f = func.func + x = func.args[0] + symset = {Derivative(f(x), x, i) for i in range(order+1)} + try: + rhs, lhs_terms = _lin_eq2dict(eq, symset) + except PolyNonlinearError: + return None + + if rhs.has(func) or any(c.has(func) for c in lhs_terms.values()): + return None + terms = {i: lhs_terms.get(f(x).diff(x, i), S.Zero) for i in range(order+1)} + terms[-1] = rhs + return terms + + # TODO: Add methods that can be used by many ODE solvers: + # order + # is_linear() + # get_linear_coefficients() + # eq_prepared (the ODE in prepared form) + + +class SingleODESolver: + """ + Base class for Single ODE solvers. + + Subclasses should implement the _matches and _get_general_solution + methods. This class is not intended to be instantiated directly but its + subclasses are as part of dsolve. + + Examples + ======== + + You can use a subclass of SingleODEProblem to solve a particular type of + ODE. We first define a particular ODE problem: + + >>> from sympy import Function, Symbol + >>> x = Symbol('x') + >>> f = Function('f') + >>> eq = f(x).diff(x, 2) + + Now we solve this problem using the NthAlgebraic solver which is a + subclass of SingleODESolver: + + >>> from sympy.solvers.ode.single import NthAlgebraic, SingleODEProblem + >>> problem = SingleODEProblem(eq, f(x), x) + >>> solver = NthAlgebraic(problem) + >>> solver.get_general_solution() + [Eq(f(x), _C*x + _C)] + + The normal way to solve an ODE is to use dsolve (which would use + NthAlgebraic and other solvers internally). When using dsolve a number of + other things are done such as evaluating integrals, simplifying the + solution and renumbering the constants: + + >>> from sympy import dsolve + >>> dsolve(eq, hint='nth_algebraic') + Eq(f(x), C1 + C2*x) + """ + + # Subclasses should store the hint name (the argument to dsolve) in this + # attribute + hint: ClassVar[str] + + # Subclasses should define this to indicate if they support an _Integral + # hint. + has_integral: ClassVar[bool] + + # The ODE to be solved + ode_problem: SingleODEProblem + + # Cache whether or not the equation has matched the method + _matched: bool | None = None + + # Subclasses should store in this attribute the list of order(s) of ODE + # that subclass can solve or leave it to None if not specific to any order + order: list | None = None + + def __init__(self, ode_problem): + self.ode_problem = ode_problem + + def matches(self) -> bool: + if self.order is not None and self.ode_problem.order not in self.order: + self._matched = False + return self._matched + + if self._matched is None: + self._matched = self._matches() + return self._matched + + def get_general_solution(self, *, simplify: bool = True) -> list[Equality]: + if not self.matches(): + msg = "%s solver cannot solve:\n%s" + raise ODEMatchError(msg % (self.hint, self.ode_problem.eq)) + return self._get_general_solution(simplify_flag=simplify) + + def _matches(self) -> bool: + msg = "Subclasses of SingleODESolver should implement matches." + raise NotImplementedError(msg) + + def _get_general_solution(self, *, simplify_flag: bool = True) -> list[Equality]: + msg = "Subclasses of SingleODESolver should implement get_general_solution." + raise NotImplementedError(msg) + + +class SinglePatternODESolver(SingleODESolver): + '''Superclass for ODE solvers based on pattern matching''' + + def wilds(self): + prob = self.ode_problem + f = prob.func.func + x = prob.sym + order = prob.order + return self._wilds(f, x, order) + + def wilds_match(self): + match = self._wilds_match + return [match.get(w, S.Zero) for w in self.wilds()] + + def _matches(self): + eq = self.ode_problem.eq_expanded + f = self.ode_problem.func.func + x = self.ode_problem.sym + order = self.ode_problem.order + df = f(x).diff(x, order) + + if order not in [1, 2]: + return False + + pattern = self._equation(f(x), x, order) + + if not pattern.coeff(df).has(Wild): + eq = expand(eq / eq.coeff(df)) + eq = eq.collect([f(x).diff(x), f(x)], func = cancel) + + self._wilds_match = match = eq.match(pattern) + if match is not None: + return self._verify(f(x)) + return False + + def _verify(self, fx) -> bool: + return True + + def _wilds(self, f, x, order): + msg = "Subclasses of SingleODESolver should implement _wilds" + raise NotImplementedError(msg) + + def _equation(self, fx, x, order): + msg = "Subclasses of SingleODESolver should implement _equation" + raise NotImplementedError(msg) + + +class NthAlgebraic(SingleODESolver): + r""" + Solves an `n`\th order ordinary differential equation using algebra and + integrals. + + There is no general form for the kind of equation that this can solve. The + the equation is solved algebraically treating differentiation as an + invertible algebraic function. + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = Eq(f(x) * (f(x).diff(x)**2 - 1), 0) + >>> dsolve(eq, f(x), hint='nth_algebraic') + [Eq(f(x), 0), Eq(f(x), C1 - x), Eq(f(x), C1 + x)] + + Note that this solver can return algebraic solutions that do not have any + integration constants (f(x) = 0 in the above example). + """ + + hint = 'nth_algebraic' + has_integral = True # nth_algebraic_Integral hint + + def _matches(self): + r""" + Matches any differential equation that nth_algebraic can solve. Uses + `sympy.solve` but teaches it how to integrate derivatives. + + This involves calling `sympy.solve` and does most of the work of finding a + solution (apart from evaluating the integrals). + """ + eq = self.ode_problem.eq + func = self.ode_problem.func + var = self.ode_problem.sym + + # Derivative that solve can handle: + diffx = self._get_diffx(var) + + # Replace derivatives wrt the independent variable with diffx + def replace(eq, var): + def expand_diffx(*args): + differand, diffs = args[0], args[1:] + toreplace = differand + for v, n in diffs: + for _ in range(n): + if v == var: + toreplace = diffx(toreplace) + else: + toreplace = Derivative(toreplace, v) + return toreplace + return eq.replace(Derivative, expand_diffx) + + # Restore derivatives in solution afterwards + def unreplace(eq, var): + return eq.replace(diffx, lambda e: Derivative(e, var)) + + subs_eqn = replace(eq, var) + try: + # turn off simplification to protect Integrals that have + # _t instead of fx in them and would otherwise factor + # as t_*Integral(1, x) + solns = solve(subs_eqn, func, simplify=False) + except NotImplementedError: + solns = [] + + solns = [simplify(unreplace(soln, var)) for soln in solns] + solns = [Equality(func, soln) for soln in solns] + + self.solutions = solns + return len(solns) != 0 + + def _get_general_solution(self, *, simplify_flag: bool = True): + return self.solutions + + # This needs to produce an invertible function but the inverse depends + # which variable we are integrating with respect to. Since the class can + # be stored in cached results we need to ensure that we always get the + # same class back for each particular integration variable so we store these + # classes in a global dict: + _diffx_stored: dict[Symbol, type[Function]] = {} + + @staticmethod + def _get_diffx(var): + diffcls = NthAlgebraic._diffx_stored.get(var, None) + + if diffcls is None: + # A class that behaves like Derivative wrt var but is "invertible". + class diffx(Function): + def inverse(self): + # don't use integrate here because fx has been replaced by _t + # in the equation; integrals will not be correct while solve + # is at work. + return lambda expr: Integral(expr, var) + Dummy('C') + + diffcls = NthAlgebraic._diffx_stored.setdefault(var, diffx) + + return diffcls + + +class FirstExact(SinglePatternODESolver): + r""" + Solves 1st order exact ordinary differential equations. + + A 1st order differential equation is called exact if it is the total + differential of a function. That is, the differential equation + + .. math:: P(x, y) \,\partial{}x + Q(x, y) \,\partial{}y = 0 + + is exact if there is some function `F(x, y)` such that `P(x, y) = + \partial{}F/\partial{}x` and `Q(x, y) = \partial{}F/\partial{}y`. It can + be shown that a necessary and sufficient condition for a first order ODE + to be exact is that `\partial{}P/\partial{}y = \partial{}Q/\partial{}x`. + Then, the solution will be as given below:: + + >>> from sympy import Function, Eq, Integral, symbols, pprint + >>> x, y, t, x0, y0, C1= symbols('x,y,t,x0,y0,C1') + >>> P, Q, F= map(Function, ['P', 'Q', 'F']) + >>> pprint(Eq(Eq(F(x, y), Integral(P(t, y), (t, x0, x)) + + ... Integral(Q(x0, t), (t, y0, y))), C1)) + x y + / / + | | + F(x, y) = | P(t, y) dt + | Q(x0, t) dt = C1 + | | + / / + x0 y0 + + Where the first partials of `P` and `Q` exist and are continuous in a + simply connected region. + + A note: SymPy currently has no way to represent inert substitution on an + expression, so the hint ``1st_exact_Integral`` will return an integral + with `dy`. This is supposed to represent the function that you are + solving for. + + Examples + ======== + + >>> from sympy import Function, dsolve, cos, sin + >>> from sympy.abc import x + >>> f = Function('f') + >>> dsolve(cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x), + ... f(x), hint='1st_exact') + Eq(x*cos(f(x)) + f(x)**3/3, C1) + + References + ========== + + - https://en.wikipedia.org/wiki/Exact_differential_equation + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 73 + + # indirect doctest + + """ + hint = "1st_exact" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + P = Wild('P', exclude=[f(x).diff(x)]) + Q = Wild('Q', exclude=[f(x).diff(x)]) + return P, Q + + def _equation(self, fx, x, order): + P, Q = self.wilds() + return P + Q*fx.diff(x) + + def _verify(self, fx) -> bool: + P, Q = self.wilds() + x = self.ode_problem.sym + y = Dummy('y') + + m, n = self.wilds_match() + + m = m.subs(fx, y) + n = n.subs(fx, y) + numerator = cancel(m.diff(y) - n.diff(x)) + + if numerator.is_zero: + # Is exact + return True + else: + # The following few conditions try to convert a non-exact + # differential equation into an exact one. + # References: + # 1. Differential equations with applications + # and historical notes - George E. Simmons + # 2. https://math.okstate.edu/people/binegar/2233-S99/2233-l12.pdf + + factor_n = cancel(numerator/n) + factor_m = cancel(-numerator/m) + if y not in factor_n.free_symbols: + # If (dP/dy - dQ/dx) / Q = f(x) + # then exp(integral(f(x))*equation becomes exact + factor = factor_n + integration_variable = x + elif x not in factor_m.free_symbols: + # If (dP/dy - dQ/dx) / -P = f(y) + # then exp(integral(f(y))*equation becomes exact + factor = factor_m + integration_variable = y + else: + # Couldn't convert to exact + return False + + factor = exp(Integral(factor, integration_variable)) + m *= factor + n *= factor + self._wilds_match[P] = m.subs(y, fx) + self._wilds_match[Q] = n.subs(y, fx) + return True + + def _get_general_solution(self, *, simplify_flag: bool = True): + m, n = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + (C1,) = self.ode_problem.get_numbered_constants(num=1) + y = Dummy('y') + + m = m.subs(fx, y) + n = n.subs(fx, y) + + gen_sol = Eq(Subs(Integral(m, x) + + Integral(n - Integral(m, x).diff(y), y), y, fx), C1) + return [gen_sol] + + +class FirstLinear(SinglePatternODESolver): + r""" + Solves 1st order linear differential equations. + + These are differential equations of the form + + .. math:: dy/dx + P(x) y = Q(x)\text{.} + + These kinds of differential equations can be solved in a general way. The + integrating factor `e^{\int P(x) \,dx}` will turn the equation into a + separable equation. The general solution is:: + + >>> from sympy import Function, dsolve, Eq, pprint, diff, sin + >>> from sympy.abc import x + >>> f, P, Q = map(Function, ['f', 'P', 'Q']) + >>> genform = Eq(f(x).diff(x) + P(x)*f(x), Q(x)) + >>> pprint(genform) + d + P(x)*f(x) + --(f(x)) = Q(x) + dx + >>> pprint(dsolve(genform, f(x), hint='1st_linear_Integral')) + / / \ + | | | + | | / | / + | | | | | + | | | P(x) dx | - | P(x) dx + | | | | | + | | / | / + f(x) = |C1 + | Q(x)*e dx|*e + | | | + \ / / + + + Examples + ======== + + >>> f = Function('f') + >>> pprint(dsolve(Eq(x*diff(f(x), x) - f(x), x**2*sin(x)), + ... f(x), '1st_linear')) + f(x) = x*(C1 - cos(x)) + + References + ========== + + - https://en.wikipedia.org/wiki/Linear_differential_equation#First-order_equation_with_variable_coefficients + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 92 + + # indirect doctest + + """ + hint = '1st_linear' + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + P = Wild('P', exclude=[f(x)]) + Q = Wild('Q', exclude=[f(x), f(x).diff(x)]) + return P, Q + + def _equation(self, fx, x, order): + P, Q = self.wilds() + return fx.diff(x) + P*fx - Q + + def _get_general_solution(self, *, simplify_flag: bool = True): + P, Q = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + (C1,) = self.ode_problem.get_numbered_constants(num=1) + gensol = Eq(fx, ((C1 + Integral(Q*exp(Integral(P, x)), x)) + * exp(-Integral(P, x)))) + return [gensol] + + +class AlmostLinear(SinglePatternODESolver): + r""" + Solves an almost-linear differential equation. + + The general form of an almost linear differential equation is + + .. math:: a(x) g'(f(x)) f'(x) + b(x) g(f(x)) + c(x) + + Here `f(x)` is the function to be solved for (the dependent variable). + The substitution `g(f(x)) = u(x)` leads to a linear differential equation + for `u(x)` of the form `a(x) u' + b(x) u + c(x) = 0`. This can be solved + for `u(x)` by the `first_linear` hint and then `f(x)` is found by solving + `g(f(x)) = u(x)`. + + See Also + ======== + :obj:`sympy.solvers.ode.single.FirstLinear` + + Examples + ======== + + >>> from sympy import dsolve, Function, pprint, sin, cos + >>> from sympy.abc import x + >>> f = Function('f') + >>> d = f(x).diff(x) + >>> eq = x*d + x*f(x) + 1 + >>> dsolve(eq, f(x), hint='almost_linear') + Eq(f(x), (C1 - Ei(x))*exp(-x)) + >>> pprint(dsolve(eq, f(x), hint='almost_linear')) + -x + f(x) = (C1 - Ei(x))*e + >>> example = cos(f(x))*f(x).diff(x) + sin(f(x)) + 1 + >>> pprint(example) + d + sin(f(x)) + cos(f(x))*--(f(x)) + 1 + dx + >>> pprint(dsolve(example, f(x), hint='almost_linear')) + / -x \ / -x \ + [f(x) = pi - asin\C1*e - 1/, f(x) = asin\C1*e - 1/] + + + References + ========== + + - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications + of the ACM, Volume 14, Number 8, August 1971, pp. 558 + """ + hint = "almost_linear" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + P = Wild('P', exclude=[f(x).diff(x)]) + Q = Wild('Q', exclude=[f(x).diff(x)]) + return P, Q + + def _equation(self, fx, x, order): + P, Q = self.wilds() + return P*fx.diff(x) + Q + + def _verify(self, fx): + a, b = self.wilds_match() + c, b = b.as_independent(fx) if b.is_Add else (S.Zero, b) + # a, b and c are the function a(x), b(x) and c(x) respectively. + # c(x) is obtained by separating out b as terms with and without fx i.e, l(y) + # The following conditions checks if the given equation is an almost-linear differential equation using the fact that + # a(x)*(l(y))' / l(y)' is independent of l(y) + + if b.diff(fx) != 0 and not simplify(b.diff(fx)/a).has(fx): + self.ly = factor_terms(b).as_independent(fx, as_Add=False)[1] # Gives the term containing fx i.e., l(y) + self.ax = a / self.ly.diff(fx) + self.cx = -c # cx is taken as -c(x) to simplify expression in the solution integral + self.bx = factor_terms(b) / self.ly + return True + + return False + + def _get_general_solution(self, *, simplify_flag: bool = True): + x = self.ode_problem.sym + (C1,) = self.ode_problem.get_numbered_constants(num=1) + gensol = Eq(self.ly, ((C1 + Integral((self.cx/self.ax)*exp(Integral(self.bx/self.ax, x)), x)) + * exp(-Integral(self.bx/self.ax, x)))) + + return [gensol] + + +class Bernoulli(SinglePatternODESolver): + r""" + Solves Bernoulli differential equations. + + These are equations of the form + + .. math:: dy/dx + P(x) y = Q(x) y^n\text{, }n \ne 1`\text{.} + + The substitution `w = 1/y^{1-n}` will transform an equation of this form + into one that is linear (see the docstring of + :obj:`~sympy.solvers.ode.single.FirstLinear`). The general solution is:: + + >>> from sympy import Function, dsolve, Eq, pprint + >>> from sympy.abc import x, n + >>> f, P, Q = map(Function, ['f', 'P', 'Q']) + >>> genform = Eq(f(x).diff(x) + P(x)*f(x), Q(x)*f(x)**n) + >>> pprint(genform) + d n + P(x)*f(x) + --(f(x)) = Q(x)*f (x) + dx + >>> pprint(dsolve(genform, f(x), hint='Bernoulli_Integral'), num_columns=110) + -1 + ----- + n - 1 + // / / \ \ + || | | | | + || | / | / | / | + || | | | | | | | + || | -(n - 1)* | P(x) dx | -(n - 1)* | P(x) dx | (n - 1)* | P(x) dx| + || | | | | | | | + || | / | / | / | + f(x) = ||C1 - n* | Q(x)*e dx + | Q(x)*e dx|*e | + || | | | | + \\ / / / / + + + Note that the equation is separable when `n = 1` (see the docstring of + :obj:`~sympy.solvers.ode.single.Separable`). + + >>> pprint(dsolve(Eq(f(x).diff(x) + P(x)*f(x), Q(x)*f(x)), f(x), + ... hint='separable_Integral')) + f(x) + / + | / + | 1 | + | - dy = C1 + | (-P(x) + Q(x)) dx + | y | + | / + / + + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq, pprint, log + >>> from sympy.abc import x + >>> f = Function('f') + + >>> pprint(dsolve(Eq(x*f(x).diff(x) + f(x), log(x)*f(x)**2), + ... f(x), hint='Bernoulli')) + 1 + f(x) = ----------------- + C1*x + log(x) + 1 + + References + ========== + + - https://en.wikipedia.org/wiki/Bernoulli_differential_equation + + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 95 + + # indirect doctest + + """ + hint = "Bernoulli" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + P = Wild('P', exclude=[f(x)]) + Q = Wild('Q', exclude=[f(x)]) + n = Wild('n', exclude=[x, f(x), f(x).diff(x)]) + return P, Q, n + + def _equation(self, fx, x, order): + P, Q, n = self.wilds() + return fx.diff(x) + P*fx - Q*fx**n + + def _get_general_solution(self, *, simplify_flag: bool = True): + P, Q, n = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + (C1,) = self.ode_problem.get_numbered_constants(num=1) + if n==1: + gensol = Eq(log(fx), ( + C1 + Integral((-P + Q), x) + )) + else: + gensol = Eq(fx**(1-n), ( + (C1 - (n - 1) * Integral(Q*exp(-n*Integral(P, x)) + * exp(Integral(P, x)), x) + ) * exp(-(1 - n)*Integral(P, x))) + ) + return [gensol] + + +class Factorable(SingleODESolver): + r""" + Solves equations having a solvable factor. + + This function is used to solve the equation having factors. Factors may be of type algebraic or ode. It + will try to solve each factor independently. Factors will be solved by calling dsolve. We will return the + list of solutions. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = (f(x)**2-4)*(f(x).diff(x)+f(x)) + >>> pprint(dsolve(eq, f(x))) + -x + [f(x) = 2, f(x) = -2, f(x) = C1*e ] + + + """ + hint = "factorable" + has_integral = False + + def _matches(self): + eq_orig = self.ode_problem.eq + f = self.ode_problem.func.func + x = self.ode_problem.sym + df = f(x).diff(x) + self.eqs = [] + eq = eq_orig.collect(f(x), func = cancel) + eq = fraction(factor(eq))[0] + factors = Mul.make_args(factor(eq)) + roots = [fac.as_base_exp() for fac in factors if len(fac.args)!=0] + if len(roots)>1 or roots[0][1]>1: + for base, expo in roots: + if base.has(f(x)): + self.eqs.append(base) + if len(self.eqs)>0: + return True + roots = solve(eq, df) + if len(roots)>0: + self.eqs = [(df - root) for root in roots] + # Avoid infinite recursion + matches = self.eqs != [eq_orig] + return matches + for i in factors: + if i.has(f(x)): + self.eqs.append(i) + return len(self.eqs)>0 and len(factors)>1 + + def _get_general_solution(self, *, simplify_flag: bool = True): + func = self.ode_problem.func.func + x = self.ode_problem.sym + eqns = self.eqs + sols = [] + for eq in eqns: + try: + sol = dsolve(eq, func(x)) + except NotImplementedError: + continue + else: + if isinstance(sol, list): + sols.extend(sol) + else: + sols.append(sol) + + if sols == []: + raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by" + + " the factorable group method") + return sols + + +class RiccatiSpecial(SinglePatternODESolver): + r""" + The general Riccati equation has the form + + .. math:: dy/dx = f(x) y^2 + g(x) y + h(x)\text{.} + + While it does not have a general solution [1], the "special" form, `dy/dx + = a y^2 - b x^c`, does have solutions in many cases [2]. This routine + returns a solution for `a(dy/dx) = b y^2 + c y/x + d/x^2` that is obtained + by using a suitable change of variables to reduce it to the special form + and is valid when neither `a` nor `b` are zero and either `c` or `d` is + zero. + + >>> from sympy.abc import x, a, b, c, d + >>> from sympy import dsolve, checkodesol, pprint, Function + >>> f = Function('f') + >>> y = f(x) + >>> genform = a*y.diff(x) - (b*y**2 + c*y/x + d/x**2) + >>> sol = dsolve(genform, y, hint="Riccati_special_minus2") + >>> pprint(sol, wrap_line=False) + / / __________________ \\ + | __________________ | / 2 || + | / 2 | \/ 4*b*d - (a + c) *log(x)|| + -|a + c - \/ 4*b*d - (a + c) *tan|C1 + ----------------------------|| + \ \ 2*a // + f(x) = ------------------------------------------------------------------------ + 2*b*x + + >>> checkodesol(genform, sol, order=1)[0] + True + + References + ========== + + - https://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Riccati + - https://eqworld.ipmnet.ru/en/solutions/ode/ode0106.pdf - + https://eqworld.ipmnet.ru/en/solutions/ode/ode0123.pdf + """ + hint = "Riccati_special_minus2" + has_integral = False + order = [1] + + def _wilds(self, f, x, order): + a = Wild('a', exclude=[x, f(x), f(x).diff(x), 0]) + b = Wild('b', exclude=[x, f(x), f(x).diff(x), 0]) + c = Wild('c', exclude=[x, f(x), f(x).diff(x)]) + d = Wild('d', exclude=[x, f(x), f(x).diff(x)]) + return a, b, c, d + + def _equation(self, fx, x, order): + a, b, c, d = self.wilds() + return a*fx.diff(x) + b*fx**2 + c*fx/x + d/x**2 + + def _get_general_solution(self, *, simplify_flag: bool = True): + a, b, c, d = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + (C1,) = self.ode_problem.get_numbered_constants(num=1) + mu = sqrt(4*d*b - (a - c)**2) + + gensol = Eq(fx, (a - c - mu*tan(mu/(2*a)*log(x) + C1))/(2*b*x)) + return [gensol] + + +class RationalRiccati(SinglePatternODESolver): + r""" + Gives general solutions to the first order Riccati differential + equations that have atleast one rational particular solution. + + .. math :: y' = b_0(x) + b_1(x) y + b_2(x) y^2 + + where `b_0`, `b_1` and `b_2` are rational functions of `x` + with `b_2 \ne 0` (`b_2 = 0` would make it a Bernoulli equation). + + Examples + ======== + + >>> from sympy import Symbol, Function, dsolve, checkodesol + >>> f = Function('f') + >>> x = Symbol('x') + + >>> eq = -x**4*f(x)**2 + x**3*f(x).diff(x) + x**2*f(x) + 20 + >>> sol = dsolve(eq, hint="1st_rational_riccati") + >>> sol + Eq(f(x), (4*C1 - 5*x**9 - 4)/(x**2*(C1 + x**9 - 1))) + >>> checkodesol(eq, sol) + (True, 0) + + References + ========== + + - Riccati ODE: https://en.wikipedia.org/wiki/Riccati_equation + - N. Thieu Vo - Rational and Algebraic Solutions of First-Order Algebraic ODEs: + Algorithm 11, pp. 78 - https://www3.risc.jku.at/publications/download/risc_5387/PhDThesisThieu.pdf + """ + has_integral = False + hint = "1st_rational_riccati" + order = [1] + + def _wilds(self, f, x, order): + b0 = Wild('b0', exclude=[f(x), f(x).diff(x)]) + b1 = Wild('b1', exclude=[f(x), f(x).diff(x)]) + b2 = Wild('b2', exclude=[f(x), f(x).diff(x)]) + return (b0, b1, b2) + + def _equation(self, fx, x, order): + b0, b1, b2 = self.wilds() + return fx.diff(x) - b0 - b1*fx - b2*fx**2 + + def _matches(self): + eq = self.ode_problem.eq_expanded + f = self.ode_problem.func.func + x = self.ode_problem.sym + order = self.ode_problem.order + + if order != 1: + return False + + match, funcs = match_riccati(eq, f, x) + if not match: + return False + _b0, _b1, _b2 = funcs + b0, b1, b2 = self.wilds() + self._wilds_match = match = {b0: _b0, b1: _b1, b2: _b2} + return True + + def _get_general_solution(self, *, simplify_flag: bool = True): + # Match the equation + b0, b1, b2 = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + return solve_riccati(fx, x, b0, b1, b2, gensol=True) + + +class SecondNonlinearAutonomousConserved(SinglePatternODESolver): + r""" + Gives solution for the autonomous second order nonlinear + differential equation of the form + + .. math :: f''(x) = g(f(x)) + + The solution for this differential equation can be computed + by multiplying by `f'(x)` and integrating on both sides, + converting it into a first order differential equation. + + Examples + ======== + + >>> from sympy import Function, symbols, dsolve + >>> f, g = symbols('f g', cls=Function) + >>> x = symbols('x') + + >>> eq = f(x).diff(x, 2) - g(f(x)) + >>> dsolve(eq, simplify=False) + [Eq(Integral(1/sqrt(C1 + 2*Integral(g(_u), _u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 + 2*Integral(g(_u), _u)), (_u, f(x))), C2 - x)] + + >>> from sympy import exp, log + >>> eq = f(x).diff(x, 2) - exp(f(x)) + log(f(x)) + >>> dsolve(eq, simplify=False) + [Eq(Integral(1/sqrt(-2*_u*log(_u) + 2*_u + C1 + 2*exp(_u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(-2*_u*log(_u) + 2*_u + C1 + 2*exp(_u)), (_u, f(x))), C2 - x)] + + References + ========== + + - https://eqworld.ipmnet.ru/en/solutions/ode/ode0301.pdf + """ + hint = "2nd_nonlinear_autonomous_conserved" + has_integral = True + order = [2] + + def _wilds(self, f, x, order): + fy = Wild('fy', exclude=[0, f(x).diff(x), f(x).diff(x, 2)]) + return (fy, ) + + def _equation(self, fx, x, order): + fy = self.wilds()[0] + return fx.diff(x, 2) + fy + + def _verify(self, fx): + return self.ode_problem.is_autonomous + + def _get_general_solution(self, *, simplify_flag: bool = True): + g = self.wilds_match()[0] + fx = self.ode_problem.func + x = self.ode_problem.sym + u = Dummy('u') + g = g.subs(fx, u) + C1, C2 = self.ode_problem.get_numbered_constants(num=2) + inside = -2*Integral(g, u) + C1 + lhs = Integral(1/sqrt(inside), (u, fx)) + return [Eq(lhs, C2 + x), Eq(lhs, C2 - x)] + + +class Liouville(SinglePatternODESolver): + r""" + Solves 2nd order Liouville differential equations. + + The general form of a Liouville ODE is + + .. math:: \frac{d^2 y}{dx^2} + g(y) \left(\! + \frac{dy}{dx}\!\right)^2 + h(x) + \frac{dy}{dx}\text{.} + + The general solution is: + + >>> from sympy import Function, dsolve, Eq, pprint, diff + >>> from sympy.abc import x + >>> f, g, h = map(Function, ['f', 'g', 'h']) + >>> genform = Eq(diff(f(x),x,x) + g(f(x))*diff(f(x),x)**2 + + ... h(x)*diff(f(x),x), 0) + >>> pprint(genform) + 2 2 + /d \ d d + g(f(x))*|--(f(x))| + h(x)*--(f(x)) + ---(f(x)) = 0 + \dx / dx 2 + dx + >>> pprint(dsolve(genform, f(x), hint='Liouville_Integral')) + f(x) + / / + | | + | / | / + | | | | + | - | h(x) dx | | g(y) dy + | | | | + | / | / + C1 + C2* | e dx + | e dy = 0 + | | + / / + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(diff(f(x), x, x) + diff(f(x), x)**2/f(x) + + ... diff(f(x), x)/x, f(x), hint='Liouville')) + ________________ ________________ + [f(x) = -\/ C1 + C2*log(x) , f(x) = \/ C1 + C2*log(x) ] + + References + ========== + + - Goldstein and Braun, "Advanced Methods for the Solution of Differential + Equations", pp. 98 + - https://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Liouville + + # indirect doctest + + """ + hint = "Liouville" + has_integral = True + order = [2] + + def _wilds(self, f, x, order): + d = Wild('d', exclude=[f(x).diff(x), f(x).diff(x, 2)]) + e = Wild('e', exclude=[f(x).diff(x)]) + k = Wild('k', exclude=[f(x).diff(x)]) + return d, e, k + + def _equation(self, fx, x, order): + # Liouville ODE in the form + # f(x).diff(x, 2) + g(f(x))*(f(x).diff(x))**2 + h(x)*f(x).diff(x) + # See Goldstein and Braun, "Advanced Methods for the Solution of + # Differential Equations", pg. 98 + d, e, k = self.wilds() + return d*fx.diff(x, 2) + e*fx.diff(x)**2 + k*fx.diff(x) + + def _verify(self, fx): + d, e, k = self.wilds_match() + self.y = Dummy('y') + x = self.ode_problem.sym + self.g = simplify(e/d).subs(fx, self.y) + self.h = simplify(k/d).subs(fx, self.y) + if self.y in self.h.free_symbols or x in self.g.free_symbols: + return False + return True + + def _get_general_solution(self, *, simplify_flag: bool = True): + d, e, k = self.wilds_match() + fx = self.ode_problem.func + x = self.ode_problem.sym + C1, C2 = self.ode_problem.get_numbered_constants(num=2) + int = Integral(exp(Integral(self.g, self.y)), (self.y, None, fx)) + gen_sol = Eq(int + C1*Integral(exp(-Integral(self.h, x)), x) + C2, 0) + + return [gen_sol] + + +class Separable(SinglePatternODESolver): + r""" + Solves separable 1st order differential equations. + + This is any differential equation that can be written as `P(y) + \tfrac{dy}{dx} = Q(x)`. The solution can then just be found by + rearranging terms and integrating: `\int P(y) \,dy = \int Q(x) \,dx`. + This hint uses :py:meth:`sympy.simplify.simplify.separatevars` as its back + end, so if a separable equation is not caught by this solver, it is most + likely the fault of that function. + :py:meth:`~sympy.simplify.simplify.separatevars` is + smart enough to do most expansion and factoring necessary to convert a + separable equation `F(x, y)` into the proper form `P(x)\cdot{}Q(y)`. The + general solution is:: + + >>> from sympy import Function, dsolve, Eq, pprint + >>> from sympy.abc import x + >>> a, b, c, d, f = map(Function, ['a', 'b', 'c', 'd', 'f']) + >>> genform = Eq(a(x)*b(f(x))*f(x).diff(x), c(x)*d(f(x))) + >>> pprint(genform) + d + a(x)*b(f(x))*--(f(x)) = c(x)*d(f(x)) + dx + >>> pprint(dsolve(genform, f(x), hint='separable_Integral')) + f(x) + / / + | | + | b(y) | c(x) + | ---- dy = C1 + | ---- dx + | d(y) | a(x) + | | + / / + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(Eq(f(x)*f(x).diff(x) + x, 3*x*f(x)**2), f(x), + ... hint='separable', simplify=False)) + / 2 \ 2 + log\3*f (x) - 1/ x + ---------------- = C1 + -- + 6 2 + + References + ========== + + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 52 + + # indirect doctest + + """ + hint = "separable" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + d = Wild('d', exclude=[f(x).diff(x), f(x).diff(x, 2)]) + e = Wild('e', exclude=[f(x).diff(x)]) + return d, e + + def _equation(self, fx, x, order): + d, e = self.wilds() + return d + e*fx.diff(x) + + def _verify(self, fx): + d, e = self.wilds_match() + self.y = Dummy('y') + x = self.ode_problem.sym + d = separatevars(d.subs(fx, self.y)) + e = separatevars(e.subs(fx, self.y)) + # m1[coeff]*m1[x]*m1[y] + m2[coeff]*m2[x]*m2[y]*y' + self.m1 = separatevars(d, dict=True, symbols=(x, self.y)) + self.m2 = separatevars(e, dict=True, symbols=(x, self.y)) + return bool(self.m1 and self.m2) + + def _get_match_object(self): + fx = self.ode_problem.func + x = self.ode_problem.sym + return self.m1, self.m2, x, fx + + def _get_general_solution(self, *, simplify_flag: bool = True): + m1, m2, x, fx = self._get_match_object() + (C1,) = self.ode_problem.get_numbered_constants(num=1) + int = Integral(m2['coeff']*m2[self.y]/m1[self.y], + (self.y, None, fx)) + gen_sol = Eq(int, Integral(-m1['coeff']*m1[x]/ + m2[x], x) + C1) + return [gen_sol] + + +class SeparableReduced(Separable): + r""" + Solves a differential equation that can be reduced to the separable form. + + The general form of this equation is + + .. math:: y' + (y/x) H(x^n y) = 0\text{}. + + This can be solved by substituting `u(y) = x^n y`. The equation then + reduces to the separable form `\frac{u'}{u (\mathrm{power} - H(u))} - + \frac{1}{x} = 0`. + + The general solution is: + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x, n + >>> f, g = map(Function, ['f', 'g']) + >>> genform = f(x).diff(x) + (f(x)/x)*g(x**n*f(x)) + >>> pprint(genform) + / n \ + d f(x)*g\x *f(x)/ + --(f(x)) + --------------- + dx x + >>> pprint(dsolve(genform, hint='separable_reduced')) + n + x *f(x) + / + | + | 1 + | ------------ dy = C1 + log(x) + | y*(n - g(y)) + | + / + + See Also + ======== + :obj:`sympy.solvers.ode.single.Separable` + + Examples + ======== + + >>> from sympy import dsolve, Function, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> d = f(x).diff(x) + >>> eq = (x - x**2*f(x))*d - f(x) + >>> dsolve(eq, hint='separable_reduced') + [Eq(f(x), (1 - sqrt(C1*x**2 + 1))/x), Eq(f(x), (sqrt(C1*x**2 + 1) + 1)/x)] + >>> pprint(dsolve(eq, hint='separable_reduced')) + ___________ ___________ + / 2 / 2 + 1 - \/ C1*x + 1 \/ C1*x + 1 + 1 + [f(x) = ------------------, f(x) = ------------------] + x x + + References + ========== + + - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications + of the ACM, Volume 14, Number 8, August 1971, pp. 558 + """ + hint = "separable_reduced" + has_integral = True + order = [1] + + def _degree(self, expr, x): + # Made this function to calculate the degree of + # x in an expression. If expr will be of form + # x**p*y, (wheare p can be variables/rationals) then it + # will return p. + for val in expr: + if val.has(x): + if isinstance(val, Pow) and val.as_base_exp()[0] == x: + return (val.as_base_exp()[1]) + elif val == x: + return (val.as_base_exp()[1]) + else: + return self._degree(val.args, x) + return 0 + + def _powers(self, expr): + # this function will return all the different relative power of x w.r.t f(x). + # expr = x**p * f(x)**q then it will return {p/q}. + pows = set() + fx = self.ode_problem.func + x = self.ode_problem.sym + self.y = Dummy('y') + if isinstance(expr, Add): + exprs = expr.atoms(Add) + elif isinstance(expr, Mul): + exprs = expr.atoms(Mul) + elif isinstance(expr, Pow): + exprs = expr.atoms(Pow) + else: + exprs = {expr} + + for arg in exprs: + if arg.has(x): + _, u = arg.as_independent(x, fx) + pow = self._degree((u.subs(fx, self.y), ), x)/self._degree((u.subs(fx, self.y), ), self.y) + pows.add(pow) + return pows + + def _verify(self, fx): + num, den = self.wilds_match() + x = self.ode_problem.sym + factor = simplify(x/fx*num/den) + # Try representing factor in terms of x^n*y + # where n is lowest power of x in factor; + # first remove terms like sqrt(2)*3 from factor.atoms(Mul) + num, dem = factor.as_numer_denom() + num = expand(num) + dem = expand(dem) + pows = self._powers(num) + pows.update(self._powers(dem)) + pows = list(pows) + if(len(pows)==1) and pows[0]!=zoo: + self.t = Dummy('t') + self.r2 = {'t': self.t} + num = num.subs(x**pows[0]*fx, self.t) + dem = dem.subs(x**pows[0]*fx, self.t) + test = num/dem + free = test.free_symbols + if len(free) == 1 and free.pop() == self.t: + self.r2.update({'power' : pows[0], 'u' : test}) + return True + return False + return False + + def _get_match_object(self): + fx = self.ode_problem.func + x = self.ode_problem.sym + u = self.r2['u'].subs(self.r2['t'], self.y) + ycoeff = 1/(self.y*(self.r2['power'] - u)) + m1 = {self.y: 1, x: -1/x, 'coeff': 1} + m2 = {self.y: ycoeff, x: 1, 'coeff': 1} + return m1, m2, x, x**self.r2['power']*fx + + +class HomogeneousCoeffSubsDepDivIndep(SinglePatternODESolver): + r""" + Solves a 1st order differential equation with homogeneous coefficients + using the substitution `u_1 = \frac{\text{}}{\text{}}`. + + This is a differential equation + + .. math:: P(x, y) + Q(x, y) dy/dx = 0 + + such that `P` and `Q` are homogeneous and of the same order. A function + `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. + Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See + also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. + + If the coefficients `P` and `Q` in the differential equation above are + homogeneous functions of the same order, then it can be shown that the + substitution `y = u_1 x` (i.e. `u_1 = y/x`) will turn the differential + equation into an equation separable in the variables `x` and `u`. If + `h(u_1)` is the function that results from making the substitution `u_1 = + f(x)/x` on `P(x, f(x))` and `g(u_2)` is the function that results from the + substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + + Q(x, f(x)) f'(x) = 0`, then the general solution is:: + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f, g, h = map(Function, ['f', 'g', 'h']) + >>> genform = g(f(x)/x) + h(f(x)/x)*f(x).diff(x) + >>> pprint(genform) + /f(x)\ /f(x)\ d + g|----| + h|----|*--(f(x)) + \ x / \ x / dx + >>> pprint(dsolve(genform, f(x), + ... hint='1st_homogeneous_coeff_subs_dep_div_indep_Integral')) + f(x) + ---- + x + / + | + | -h(u1) + log(x) = C1 + | ---------------- d(u1) + | u1*h(u1) + g(u1) + | + / + + Where `u_1 h(u_1) + g(u_1) \ne 0` and `x \ne 0`. + + See also the docstrings of + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffBest` and + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsIndepDivDep`. + + Examples + ======== + + >>> from sympy import Function, dsolve + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), + ... hint='1st_homogeneous_coeff_subs_dep_div_indep', simplify=False)) + / 3 \ + |3*f(x) f (x)| + log|------ + -----| + | x 3 | + \ x / + log(x) = log(C1) - ------------------- + 3 + + References + ========== + + - https://en.wikipedia.org/wiki/Homogeneous_differential_equation + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 59 + + # indirect doctest + + """ + hint = "1st_homogeneous_coeff_subs_dep_div_indep" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + d = Wild('d', exclude=[f(x).diff(x), f(x).diff(x, 2)]) + e = Wild('e', exclude=[f(x).diff(x)]) + return d, e + + def _equation(self, fx, x, order): + d, e = self.wilds() + return d + e*fx.diff(x) + + def _verify(self, fx): + self.d, self.e = self.wilds_match() + self.y = Dummy('y') + x = self.ode_problem.sym + self.d = separatevars(self.d.subs(fx, self.y)) + self.e = separatevars(self.e.subs(fx, self.y)) + ordera = homogeneous_order(self.d, x, self.y) + orderb = homogeneous_order(self.e, x, self.y) + if ordera == orderb and ordera is not None: + self.u = Dummy('u') + if simplify((self.d + self.u*self.e).subs({x: 1, self.y: self.u})) != 0: + return True + return False + return False + + def _get_match_object(self): + fx = self.ode_problem.func + x = self.ode_problem.sym + self.u1 = Dummy('u1') + xarg = 0 + yarg = 0 + return [self.d, self.e, fx, x, self.u, self.u1, self.y, xarg, yarg] + + def _get_general_solution(self, *, simplify_flag: bool = True): + d, e, fx, x, u, u1, y, xarg, yarg = self._get_match_object() + (C1,) = self.ode_problem.get_numbered_constants(num=1) + int = Integral( + (-e/(d + u1*e)).subs({x: 1, y: u1}), + (u1, None, fx/x)) + sol = logcombine(Eq(log(x), int + log(C1)), force=True) + gen_sol = sol.subs(fx, u).subs(((u, u - yarg), (x, x - xarg), (u, fx))) + return [gen_sol] + + +class HomogeneousCoeffSubsIndepDivDep(SinglePatternODESolver): + r""" + Solves a 1st order differential equation with homogeneous coefficients + using the substitution `u_2 = \frac{\text{}}{\text{}}`. + + This is a differential equation + + .. math:: P(x, y) + Q(x, y) dy/dx = 0 + + such that `P` and `Q` are homogeneous and of the same order. A function + `F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`. + Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See + also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`. + + If the coefficients `P` and `Q` in the differential equation above are + homogeneous functions of the same order, then it can be shown that the + substitution `x = u_2 y` (i.e. `u_2 = x/y`) will turn the differential + equation into an equation separable in the variables `y` and `u_2`. If + `h(u_2)` is the function that results from making the substitution `u_2 = + x/f(x)` on `P(x, f(x))` and `g(u_2)` is the function that results from the + substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) + + Q(x, f(x)) f'(x) = 0`, then the general solution is: + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f, g, h = map(Function, ['f', 'g', 'h']) + >>> genform = g(x/f(x)) + h(x/f(x))*f(x).diff(x) + >>> pprint(genform) + / x \ / x \ d + g|----| + h|----|*--(f(x)) + \f(x)/ \f(x)/ dx + >>> pprint(dsolve(genform, f(x), + ... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral')) + x + ---- + f(x) + / + | + | -g(u1) + | ---------------- d(u1) + | u1*g(u1) + h(u1) + | + / + + f(x) = C1*e + + Where `u_1 g(u_1) + h(u_1) \ne 0` and `f(x) \ne 0`. + + See also the docstrings of + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffBest` and + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsDepDivIndep`. + + Examples + ======== + + >>> from sympy import Function, pprint, dsolve + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), + ... hint='1st_homogeneous_coeff_subs_indep_div_dep', + ... simplify=False)) + / 2 \ + |3*x | + log|----- + 1| + | 2 | + \f (x) / + log(f(x)) = log(C1) - -------------- + 3 + + References + ========== + + - https://en.wikipedia.org/wiki/Homogeneous_differential_equation + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 59 + + # indirect doctest + + """ + hint = "1st_homogeneous_coeff_subs_indep_div_dep" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + d = Wild('d', exclude=[f(x).diff(x), f(x).diff(x, 2)]) + e = Wild('e', exclude=[f(x).diff(x)]) + return d, e + + def _equation(self, fx, x, order): + d, e = self.wilds() + return d + e*fx.diff(x) + + def _verify(self, fx): + self.d, self.e = self.wilds_match() + self.y = Dummy('y') + x = self.ode_problem.sym + self.d = separatevars(self.d.subs(fx, self.y)) + self.e = separatevars(self.e.subs(fx, self.y)) + ordera = homogeneous_order(self.d, x, self.y) + orderb = homogeneous_order(self.e, x, self.y) + if ordera == orderb and ordera is not None: + self.u = Dummy('u') + if simplify((self.e + self.u*self.d).subs({x: self.u, self.y: 1})) != 0: + return True + return False + return False + + def _get_match_object(self): + fx = self.ode_problem.func + x = self.ode_problem.sym + self.u1 = Dummy('u1') + xarg = 0 + yarg = 0 + return [self.d, self.e, fx, x, self.u, self.u1, self.y, xarg, yarg] + + def _get_general_solution(self, *, simplify_flag: bool = True): + d, e, fx, x, u, u1, y, xarg, yarg = self._get_match_object() + (C1,) = self.ode_problem.get_numbered_constants(num=1) + int = Integral(simplify((-d/(e + u1*d)).subs({x: u1, y: 1})), (u1, None, x/fx)) # type: ignore + sol = logcombine(Eq(log(fx), int + log(C1)), force=True) + gen_sol = sol.subs(fx, u).subs(((u, u - yarg), (x, x - xarg), (u, fx))) + return [gen_sol] + + +class HomogeneousCoeffBest(HomogeneousCoeffSubsIndepDivDep, HomogeneousCoeffSubsDepDivIndep): + r""" + Returns the best solution to an ODE from the two hints + ``1st_homogeneous_coeff_subs_dep_div_indep`` and + ``1st_homogeneous_coeff_subs_indep_div_dep``. + + This is as determined by :py:meth:`~sympy.solvers.ode.ode.ode_sol_simplicity`. + + See the + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsIndepDivDep` + and + :obj:`~sympy.solvers.ode.single.HomogeneousCoeffSubsDepDivIndep` + docstrings for more information on these hints. Note that there is no + ``ode_1st_homogeneous_coeff_best_Integral`` hint. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x), + ... hint='1st_homogeneous_coeff_best', simplify=False)) + / 2 \ + |3*x | + log|----- + 1| + | 2 | + \f (x) / + log(f(x)) = log(C1) - -------------- + 3 + + References + ========== + + - https://en.wikipedia.org/wiki/Homogeneous_differential_equation + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 59 + + # indirect doctest + + """ + hint = "1st_homogeneous_coeff_best" + has_integral = False + order = [1] + + def _verify(self, fx): + return HomogeneousCoeffSubsIndepDivDep._verify(self, fx) and \ + HomogeneousCoeffSubsDepDivIndep._verify(self, fx) + + def _get_general_solution(self, *, simplify_flag: bool = True): + # There are two substitutions that solve the equation, u1=y/x and u2=x/y + # # They produce different integrals, so try them both and see which + # # one is easier + sol1 = HomogeneousCoeffSubsIndepDivDep._get_general_solution(self) + sol2 = HomogeneousCoeffSubsDepDivIndep._get_general_solution(self) + fx = self.ode_problem.func + if simplify_flag: + sol1 = odesimp(self.ode_problem.eq, *sol1, fx, "1st_homogeneous_coeff_subs_indep_div_dep") + sol2 = odesimp(self.ode_problem.eq, *sol2, fx, "1st_homogeneous_coeff_subs_dep_div_indep") + # XXX: not simplify should be not simplify_flag. mypy correctly complains + return min([sol1, sol2], key=lambda x: ode_sol_simplicity(x, fx, trysolving=not simplify)) # type: ignore + + +class LinearCoefficients(HomogeneousCoeffBest): + r""" + Solves a differential equation with linear coefficients. + + The general form of a differential equation with linear coefficients is + + .. math:: y' + F\left(\!\frac{a_1 x + b_1 y + c_1}{a_2 x + b_2 y + + c_2}\!\right) = 0\text{,} + + where `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are constants and `a_1 b_2 + - a_2 b_1 \ne 0`. + + This can be solved by substituting: + + .. math:: x = x' + \frac{b_2 c_1 - b_1 c_2}{a_2 b_1 - a_1 b_2} + + y = y' + \frac{a_1 c_2 - a_2 c_1}{a_2 b_1 - a_1 + b_2}\text{.} + + This substitution reduces the equation to a homogeneous differential + equation. + + See Also + ======== + :obj:`sympy.solvers.ode.single.HomogeneousCoeffBest` + :obj:`sympy.solvers.ode.single.HomogeneousCoeffSubsIndepDivDep` + :obj:`sympy.solvers.ode.single.HomogeneousCoeffSubsDepDivIndep` + + Examples + ======== + + >>> from sympy import dsolve, Function, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> df = f(x).diff(x) + >>> eq = (x + f(x) + 1)*df + (f(x) - 6*x + 1) + >>> dsolve(eq, hint='linear_coefficients') + [Eq(f(x), -x - sqrt(C1 + 7*x**2) - 1), Eq(f(x), -x + sqrt(C1 + 7*x**2) - 1)] + >>> pprint(dsolve(eq, hint='linear_coefficients')) + ___________ ___________ + / 2 / 2 + [f(x) = -x - \/ C1 + 7*x - 1, f(x) = -x + \/ C1 + 7*x - 1] + + + References + ========== + + - Joel Moses, "Symbolic Integration - The Stormy Decade", Communications + of the ACM, Volume 14, Number 8, August 1971, pp. 558 + """ + hint = "linear_coefficients" + has_integral = True + order = [1] + + def _wilds(self, f, x, order): + d = Wild('d', exclude=[f(x).diff(x), f(x).diff(x, 2)]) + e = Wild('e', exclude=[f(x).diff(x)]) + return d, e + + def _equation(self, fx, x, order): + d, e = self.wilds() + return d + e*fx.diff(x) + + def _verify(self, fx): + self.d, self.e = self.wilds_match() + a, b = self.wilds() + F = self.d/self.e + x = self.ode_problem.sym + params = self._linear_coeff_match(F, fx) + if params: + self.xarg, self.yarg = params + u = Dummy('u') + t = Dummy('t') + self.y = Dummy('y') + # Dummy substitution for df and f(x). + dummy_eq = self.ode_problem.eq.subs(((fx.diff(x), t), (fx, u))) + reps = ((x, x + self.xarg), (u, u + self.yarg), (t, fx.diff(x)), (u, fx)) + dummy_eq = simplify(dummy_eq.subs(reps)) + # get the re-cast values for e and d + r2 = collect(expand(dummy_eq), [fx.diff(x), fx]).match(a*fx.diff(x) + b) + if r2: + self.d, self.e = r2[b], r2[a] + orderd = homogeneous_order(self.d, x, fx) + ordere = homogeneous_order(self.e, x, fx) + if orderd == ordere and orderd is not None: + self.d = self.d.subs(fx, self.y) + self.e = self.e.subs(fx, self.y) + return True + return False + return False + + def _linear_coeff_match(self, expr, func): + r""" + Helper function to match hint ``linear_coefficients``. + + Matches the expression to the form `(a_1 x + b_1 f(x) + c_1)/(a_2 x + b_2 + f(x) + c_2)` where the following conditions hold: + + 1. `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are Rationals; + 2. `c_1` or `c_2` are not equal to zero; + 3. `a_2 b_1 - a_1 b_2` is not equal to zero. + + Return ``xarg``, ``yarg`` where + + 1. ``xarg`` = `(b_2 c_1 - b_1 c_2)/(a_2 b_1 - a_1 b_2)` + 2. ``yarg`` = `(a_1 c_2 - a_2 c_1)/(a_2 b_1 - a_1 b_2)` + + + Examples + ======== + + >>> from sympy import Function, sin + >>> from sympy.abc import x + >>> from sympy.solvers.ode.single import LinearCoefficients + >>> f = Function('f') + >>> eq = (-25*f(x) - 8*x + 62)/(4*f(x) + 11*x - 11) + >>> obj = LinearCoefficients(eq) + >>> obj._linear_coeff_match(eq, f(x)) + (1/9, 22/9) + >>> eq = sin((-5*f(x) - 8*x + 6)/(4*f(x) + x - 1)) + >>> obj = LinearCoefficients(eq) + >>> obj._linear_coeff_match(eq, f(x)) + (19/27, 2/27) + >>> eq = sin(f(x)/x) + >>> obj = LinearCoefficients(eq) + >>> obj._linear_coeff_match(eq, f(x)) + + """ + f = func.func + x = func.args[0] + def abc(eq): + r''' + Internal function of _linear_coeff_match + that returns Rationals a, b, c + if eq is a*x + b*f(x) + c, else None. + ''' + eq = _mexpand(eq) + c = eq.as_independent(x, f(x), as_Add=True)[0] + if not c.is_Rational: + return + a = eq.coeff(x) + if not a.is_Rational: + return + b = eq.coeff(f(x)) + if not b.is_Rational: + return + if eq == a*x + b*f(x) + c: + return a, b, c + + def match(arg): + r''' + Internal function of _linear_coeff_match that returns Rationals a1, + b1, c1, a2, b2, c2 and a2*b1 - a1*b2 of the expression (a1*x + b1*f(x) + + c1)/(a2*x + b2*f(x) + c2) if one of c1 or c2 and a2*b1 - a1*b2 is + non-zero, else None. + ''' + n, d = arg.together().as_numer_denom() + m = abc(n) + if m is not None: + a1, b1, c1 = m + m = abc(d) + if m is not None: + a2, b2, c2 = m + d = a2*b1 - a1*b2 + if (c1 or c2) and d: + return a1, b1, c1, a2, b2, c2, d + + m = [fi.args[0] for fi in expr.atoms(Function) if fi.func != f and + len(fi.args) == 1 and not fi.args[0].is_Function] or {expr} + m1 = match(m.pop()) + if m1 and all(match(mi) == m1 for mi in m): + a1, b1, c1, a2, b2, c2, denom = m1 + return (b2*c1 - b1*c2)/denom, (a1*c2 - a2*c1)/denom + + def _get_match_object(self): + fx = self.ode_problem.func + x = self.ode_problem.sym + self.u1 = Dummy('u1') + u = Dummy('u') + return [self.d, self.e, fx, x, u, self.u1, self.y, self.xarg, self.yarg] + + +class NthOrderReducible(SingleODESolver): + r""" + Solves ODEs that only involve derivatives of the dependent variable using + a substitution of the form `f^n(x) = g(x)`. + + For example any second order ODE of the form `f''(x) = h(f'(x), x)` can be + transformed into a pair of 1st order ODEs `g'(x) = h(g(x), x)` and + `f'(x) = g(x)`. Usually the 1st order ODE for `g` is easier to solve. If + that gives an explicit solution for `g` then `f` is found simply by + integration. + + + Examples + ======== + + >>> from sympy import Function, dsolve, Eq + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = Eq(x*f(x).diff(x)**2 + f(x).diff(x, 2), 0) + >>> dsolve(eq, f(x), hint='nth_order_reducible') + ... # doctest: +NORMALIZE_WHITESPACE + Eq(f(x), C1 - sqrt(-1/C2)*log(-C2*sqrt(-1/C2) + x) + sqrt(-1/C2)*log(C2*sqrt(-1/C2) + x)) + + """ + hint = "nth_order_reducible" + has_integral = False + + def _matches(self): + # Any ODE that can be solved with a substitution and + # repeated integration e.g.: + # `d^2/dx^2(y) + x*d/dx(y) = constant + #f'(x) must be finite for this to work + eq = self.ode_problem.eq_preprocessed + func = self.ode_problem.func + x = self.ode_problem.sym + r""" + Matches any differential equation that can be rewritten with a smaller + order. Only derivatives of ``func`` alone, wrt a single variable, + are considered, and only in them should ``func`` appear. + """ + # ODE only handles functions of 1 variable so this affirms that state + assert len(func.args) == 1 + vc = [d.variable_count[0] for d in eq.atoms(Derivative) + if d.expr == func and len(d.variable_count) == 1] + ords = [c for v, c in vc if v == x] + if len(ords) < 2: + return False + self.smallest = min(ords) + # make sure func does not appear outside of derivatives + D = Dummy() + if eq.subs(func.diff(x, self.smallest), D).has(func): + return False + return True + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq + f = self.ode_problem.func.func + x = self.ode_problem.sym + n = self.smallest + # get a unique function name for g + names = [a.name for a in eq.atoms(AppliedUndef)] + while True: + name = Dummy().name + if name not in names: + g = Function(name) + break + w = f(x).diff(x, n) + geq = eq.subs(w, g(x)) + gsol = dsolve(geq, g(x)) + + if not isinstance(gsol, list): + gsol = [gsol] + + # Might be multiple solutions to the reduced ODE: + fsol = [] + for gsoli in gsol: + fsoli = dsolve(gsoli.subs(g(x), w), f(x)) # or do integration n times + fsol.append(fsoli) + + return fsol + + +class SecondHypergeometric(SingleODESolver): + r""" + Solves 2nd order linear differential equations. + + It computes special function solutions which can be expressed using the + 2F1, 1F1 or 0F1 hypergeometric functions. + + .. math:: y'' + A(x) y' + B(x) y = 0\text{,} + + where `A` and `B` are rational functions. + + These kinds of differential equations have solution of non-Liouvillian form. + + Given linear ODE can be obtained from 2F1 given by + + .. math:: (x^2 - x) y'' + ((a + b + 1) x - c) y' + b a y = 0\text{,} + + where {a, b, c} are arbitrary constants. + + Notes + ===== + + The algorithm should find any solution of the form + + .. math:: y = P(x) _pF_q(..; ..;\frac{\alpha x^k + \beta}{\gamma x^k + \delta})\text{,} + + where pFq is any of 2F1, 1F1 or 0F1 and `P` is an "arbitrary function". + Currently only the 2F1 case is implemented in SymPy but the other cases are + described in the paper and could be implemented in future (contributions + welcome!). + + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = (x*x - x)*f(x).diff(x,2) + (5*x - 1)*f(x).diff(x) + 4*f(x) + >>> pprint(dsolve(eq, f(x), '2nd_hypergeometric')) + _ + / / 4 \\ |_ /-1, -1 | \ + |C1 + C2*|log(x) + -----||* | | | x| + \ \ x + 1// 2 1 \ 1 | / + f(x) = -------------------------------------------- + 3 + (x - 1) + + + References + ========== + + - "Non-Liouvillian solutions for second order linear ODEs" by L. Chan, E.S. Cheb-Terrab + + """ + hint = "2nd_hypergeometric" + has_integral = True + + def _matches(self): + eq = self.ode_problem.eq_preprocessed + func = self.ode_problem.func + r = match_2nd_hypergeometric(eq, func) + self.match_object = None + if r: + A, B = r + d = equivalence_hypergeometric(A, B, func) + if d: + if d['type'] == "2F1": + self.match_object = match_2nd_2F1_hypergeometric(d['I0'], d['k'], d['sing_point'], func) + if self.match_object is not None: + self.match_object.update({'A':A, 'B':B}) + # We can extend it for 1F1 and 0F1 type also. + return self.match_object is not None + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq + func = self.ode_problem.func + if self.match_object['type'] == "2F1": + sol = get_sol_2F1_hypergeometric(eq, func, self.match_object) + if sol is None: + raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by" + + " the hypergeometric method") + + return [sol] + + +class NthLinearConstantCoeffHomogeneous(SingleODESolver): + r""" + Solves an `n`\th order linear homogeneous differential equation with + constant coefficients. + + This is an equation of the form + + .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + + a_0 f(x) = 0\text{.} + + These equations can be solved in a general manner, by taking the roots of + the characteristic equation `a_n m^n + a_{n-1} m^{n-1} + \cdots + a_1 m + + a_0 = 0`. The solution will then be the sum of `C_n x^i e^{r x}` terms, + for each where `C_n` is an arbitrary constant, `r` is a root of the + characteristic equation and `i` is one of each from 0 to the multiplicity + of the root - 1 (for example, a root 3 of multiplicity 2 would create the + terms `C_1 e^{3 x} + C_2 x e^{3 x}`). The exponential is usually expanded + for complex roots using Euler's equation `e^{I x} = \cos(x) + I \sin(x)`. + Complex roots always come in conjugate pairs in polynomials with real + coefficients, so the two roots will be represented (after simplifying the + constants) as `e^{a x} \left(C_1 \cos(b x) + C_2 \sin(b x)\right)`. + + If SymPy cannot find exact roots to the characteristic equation, a + :py:class:`~sympy.polys.rootoftools.ComplexRootOf` instance will be return + instead. + + >>> from sympy import Function, dsolve + >>> from sympy.abc import x + >>> f = Function('f') + >>> dsolve(f(x).diff(x, 5) + 10*f(x).diff(x) - 2*f(x), f(x), + ... hint='nth_linear_constant_coeff_homogeneous') + ... # doctest: +NORMALIZE_WHITESPACE + Eq(f(x), C5*exp(x*CRootOf(_x**5 + 10*_x - 2, 0)) + + (C1*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 1))) + + C2*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 1))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 1))) + + (C3*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 3))) + + C4*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 3))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 3)))) + + Note that because this method does not involve integration, there is no + ``nth_linear_constant_coeff_homogeneous_Integral`` hint. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(f(x).diff(x, 4) + 2*f(x).diff(x, 3) - + ... 2*f(x).diff(x, 2) - 6*f(x).diff(x) + 5*f(x), f(x), + ... hint='nth_linear_constant_coeff_homogeneous')) + x -2*x + f(x) = (C1 + C2*x)*e + (C3*sin(x) + C4*cos(x))*e + + References + ========== + + - https://en.wikipedia.org/wiki/Linear_differential_equation section: + Nonhomogeneous_equation_with_constant_coefficients + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 211 + + # indirect doctest + + """ + hint = "nth_linear_constant_coeff_homogeneous" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + func = self.ode_problem.func + order = self.ode_problem.order + x = self.ode_problem.sym + self.r = self.ode_problem.get_linear_coefficients(eq, func, order) + if order and self.r and not any(self.r[i].has(x) for i in self.r if i >= 0): + if not self.r[-1]: + return True + else: + return False + return False + + def _get_general_solution(self, *, simplify_flag: bool = True): + fx = self.ode_problem.func + order = self.ode_problem.order + roots, collectterms = _get_const_characteristic_eq_sols(self.r, fx, order) + # A generator of constants + constants = self.ode_problem.get_numbered_constants(num=len(roots)) + gsol_rhs = Add(*[i*j for (i, j) in zip(constants, roots)]) + gsol = Eq(fx, gsol_rhs) + if simplify_flag: + gsol = _get_simplified_sol([gsol], fx, collectterms) + + return [gsol] + + +class NthLinearConstantCoeffVariationOfParameters(SingleODESolver): + r""" + Solves an `n`\th order linear differential equation with constant + coefficients using the method of variation of parameters. + + This method works on any differential equations of the form + + .. math:: f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0 + f(x) = P(x)\text{.} + + This method works by assuming that the particular solution takes the form + + .. math:: \sum_{x=1}^{n} c_i(x) y_i(x)\text{,} + + where `y_i` is the `i`\th solution to the homogeneous equation. The + solution is then solved using Wronskian's and Cramer's Rule. The + particular solution is given by + + .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx + \right) y_i(x) \text{,} + + where `W(x)` is the Wronskian of the fundamental system (the system of `n` + linearly independent solutions to the homogeneous equation), and `W_i(x)` + is the Wronskian of the fundamental system with the `i`\th column replaced + with `[0, 0, \cdots, 0, P(x)]`. + + This method is general enough to solve any `n`\th order inhomogeneous + linear differential equation with constant coefficients, but sometimes + SymPy cannot simplify the Wronskian well enough to integrate it. If this + method hangs, try using the + ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and + simplifying the integrals manually. Also, prefer using + ``nth_linear_constant_coeff_undetermined_coefficients`` when it + applies, because it does not use integration, making it faster and more + reliable. + + Warning, using simplify=False with + 'nth_linear_constant_coeff_variation_of_parameters' in + :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will + not attempt to simplify the Wronskian before integrating. It is + recommended that you only use simplify=False with + 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this + method, especially if the solution to the homogeneous equation has + trigonometric functions in it. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint, exp, log + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(f(x).diff(x, 3) - 3*f(x).diff(x, 2) + + ... 3*f(x).diff(x) - f(x) - exp(x)*log(x), f(x), + ... hint='nth_linear_constant_coeff_variation_of_parameters')) + / / / x*log(x) 11*x\\\ x + f(x) = |C1 + x*|C2 + x*|C3 + -------- - ----|||*e + \ \ \ 6 36 /// + + References + ========== + + - https://en.wikipedia.org/wiki/Variation_of_parameters + - https://planetmath.org/VariationOfParameters + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 233 + + # indirect doctest + + """ + hint = "nth_linear_constant_coeff_variation_of_parameters" + has_integral = True + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + func = self.ode_problem.func + order = self.ode_problem.order + x = self.ode_problem.sym + self.r = self.ode_problem.get_linear_coefficients(eq, func, order) + + if order and self.r and not any(self.r[i].has(x) for i in self.r if i >= 0): + if self.r[-1]: + return True + else: + return False + return False + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq_high_order_free + f = self.ode_problem.func.func + x = self.ode_problem.sym + order = self.ode_problem.order + roots, collectterms = _get_const_characteristic_eq_sols(self.r, f(x), order) + # A generator of constants + constants = self.ode_problem.get_numbered_constants(num=len(roots)) + homogen_sol_rhs = Add(*[i*j for (i, j) in zip(constants, roots)]) + homogen_sol = Eq(f(x), homogen_sol_rhs) + homogen_sol = _solve_variation_of_parameters(eq, f(x), roots, homogen_sol, order, self.r, simplify_flag) + if simplify_flag: + homogen_sol = _get_simplified_sol([homogen_sol], f(x), collectterms) + return [homogen_sol] + + +class NthLinearConstantCoeffUndeterminedCoefficients(SingleODESolver): + r""" + Solves an `n`\th order linear differential equation with constant + coefficients using the method of undetermined coefficients. + + This method works on differential equations of the form + + .. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + + a_0 f(x) = P(x)\text{,} + + where `P(x)` is a function that has a finite number of linearly + independent derivatives. + + Functions that fit this requirement are finite sums functions of the form + `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` + is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For + example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, + and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have + a finite number of derivatives, because they can be expanded into `\sin(a + x)` and `\cos(b x)` terms. However, SymPy currently cannot do that + expansion, so you will need to manually rewrite the expression in terms of + the above to use this method. So, for example, you will need to manually + convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method + of undetermined coefficients on it. + + This method works by creating a trial function from the expression and all + of its linear independent derivatives and substituting them into the + original ODE. The coefficients for each term will be a system of linear + equations, which are be solved for and substituted, giving the solution. + If any of the trial functions are linearly dependent on the solution to + the homogeneous equation, they are multiplied by sufficient `x` to make + them linearly independent. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint, exp, cos + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(f(x).diff(x, 2) + 2*f(x).diff(x) + f(x) - + ... 4*exp(-x)*x**2 + cos(2*x), f(x), + ... hint='nth_linear_constant_coeff_undetermined_coefficients')) + / / 3\\ + | | x || -x 4*sin(2*x) 3*cos(2*x) + f(x) = |C1 + x*|C2 + --||*e - ---------- + ---------- + \ \ 3 // 25 25 + + References + ========== + + - https://en.wikipedia.org/wiki/Method_of_undetermined_coefficients + - M. Tenenbaum & H. Pollard, "Ordinary Differential Equations", + Dover 1963, pp. 221 + + # indirect doctest + + """ + hint = "nth_linear_constant_coeff_undetermined_coefficients" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + func = self.ode_problem.func + order = self.ode_problem.order + x = self.ode_problem.sym + self.r = self.ode_problem.get_linear_coefficients(eq, func, order) + does_match = False + if order and self.r and not any(self.r[i].has(x) for i in self.r if i >= 0): + if self.r[-1]: + eq_homogeneous = Add(eq, -self.r[-1]) + undetcoeff = _undetermined_coefficients_match(self.r[-1], x, func, eq_homogeneous) + if undetcoeff['test']: + self.trialset = undetcoeff['trialset'] + does_match = True + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq + f = self.ode_problem.func.func + x = self.ode_problem.sym + order = self.ode_problem.order + roots, collectterms = _get_const_characteristic_eq_sols(self.r, f(x), order) + # A generator of constants + constants = self.ode_problem.get_numbered_constants(num=len(roots)) + homogen_sol_rhs = Add(*[i*j for (i, j) in zip(constants, roots)]) + homogen_sol = Eq(f(x), homogen_sol_rhs) + self.r.update({'list': roots, 'sol': homogen_sol, 'simpliy_flag': simplify_flag}) + gsol = _solve_undetermined_coefficients(eq, f(x), order, self.r, self.trialset) + if simplify_flag: + gsol = _get_simplified_sol([gsol], f(x), collectterms) + return [gsol] + + +class NthLinearEulerEqHomogeneous(SingleODESolver): + r""" + Solves an `n`\th order linear homogeneous variable-coefficient + Cauchy-Euler equidimensional ordinary differential equation. + + This is an equation with form `0 = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) + \cdots`. + + These equations can be solved in a general manner, by substituting + solutions of the form `f(x) = x^r`, and deriving a characteristic equation + for `r`. When there are repeated roots, we include extra terms of the + form `C_{r k} \ln^k(x) x^r`, where `C_{r k}` is an arbitrary integration + constant, `r` is a root of the characteristic equation, and `k` ranges + over the multiplicity of `r`. In the cases where the roots are complex, + solutions of the form `C_1 x^a \sin(b \log(x)) + C_2 x^a \cos(b \log(x))` + are returned, based on expansions with Euler's formula. The general + solution is the sum of the terms found. If SymPy cannot find exact roots + to the characteristic equation, a + :py:obj:`~.ComplexRootOf` instance will be returned + instead. + + >>> from sympy import Function, dsolve + >>> from sympy.abc import x + >>> f = Function('f') + >>> dsolve(4*x**2*f(x).diff(x, 2) + f(x), f(x), + ... hint='nth_linear_euler_eq_homogeneous') + ... # doctest: +NORMALIZE_WHITESPACE + Eq(f(x), sqrt(x)*(C1 + C2*log(x))) + + Note that because this method does not involve integration, there is no + ``nth_linear_euler_eq_homogeneous_Integral`` hint. + + The following is for internal use: + + - ``returns = 'sol'`` returns the solution to the ODE. + - ``returns = 'list'`` returns a list of linearly independent solutions, + corresponding to the fundamental solution set, for use with non + homogeneous solution methods like variation of parameters and + undetermined coefficients. Note that, though the solutions should be + linearly independent, this function does not explicitly check that. You + can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear + independence. Also, ``assert len(sollist) == order`` will need to pass. + - ``returns = 'both'``, return a dictionary ``{'sol': , + 'list': }``. + + Examples + ======== + + >>> from sympy import Function, dsolve, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = f(x).diff(x, 2)*x**2 - 4*f(x).diff(x)*x + 6*f(x) + >>> pprint(dsolve(eq, f(x), + ... hint='nth_linear_euler_eq_homogeneous')) + 2 + f(x) = x *(C1 + C2*x) + + References + ========== + + - https://en.wikipedia.org/wiki/Cauchy%E2%80%93Euler_equation + - C. Bender & S. Orszag, "Advanced Mathematical Methods for Scientists and + Engineers", Springer 1999, pp. 12 + + # indirect doctest + + """ + hint = "nth_linear_euler_eq_homogeneous" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_preprocessed + f = self.ode_problem.func.func + order = self.ode_problem.order + x = self.ode_problem.sym + match = self.ode_problem.get_linear_coefficients(eq, f(x), order) + self.r = None + does_match = False + + if order and match: + coeff = match[order] + factor = x**order / coeff + self.r = {i: factor*match[i] for i in match} + if self.r and all(_test_term(self.r[i], f(x), i) for i in + self.r if i >= 0): + if not self.r[-1]: + does_match = True + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + fx = self.ode_problem.func + eq = self.ode_problem.eq + homogen_sol = _get_euler_characteristic_eq_sols(eq, fx, self.r)[0] + return [homogen_sol] + + +class NthLinearEulerEqNonhomogeneousVariationOfParameters(SingleODESolver): + r""" + Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional + ordinary differential equation using variation of parameters. + + This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) + \cdots`. + + This method works by assuming that the particular solution takes the form + + .. math:: \sum_{x=1}^{n} c_i(x) y_i(x) {a_n} {x^n} \text{, } + + where `y_i` is the `i`\th solution to the homogeneous equation. The + solution is then solved using Wronskian's and Cramer's Rule. The + particular solution is given by multiplying eq given below with `a_n x^{n}` + + .. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \, dx + \right) y_i(x) \text{, } + + where `W(x)` is the Wronskian of the fundamental system (the system of `n` + linearly independent solutions to the homogeneous equation), and `W_i(x)` + is the Wronskian of the fundamental system with the `i`\th column replaced + with `[0, 0, \cdots, 0, \frac{x^{- n}}{a_n} g{\left(x \right)}]`. + + This method is general enough to solve any `n`\th order inhomogeneous + linear differential equation, but sometimes SymPy cannot simplify the + Wronskian well enough to integrate it. If this method hangs, try using the + ``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and + simplifying the integrals manually. Also, prefer using + ``nth_linear_constant_coeff_undetermined_coefficients`` when it + applies, because it does not use integration, making it faster and more + reliable. + + Warning, using simplify=False with + 'nth_linear_constant_coeff_variation_of_parameters' in + :py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will + not attempt to simplify the Wronskian before integrating. It is + recommended that you only use simplify=False with + 'nth_linear_constant_coeff_variation_of_parameters_Integral' for this + method, especially if the solution to the homogeneous equation has + trigonometric functions in it. + + Examples + ======== + + >>> from sympy import Function, dsolve, Derivative + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - x**4 + >>> dsolve(eq, f(x), + ... hint='nth_linear_euler_eq_nonhomogeneous_variation_of_parameters').expand() + Eq(f(x), C1*x + C2*x**2 + x**4/6) + + """ + hint = "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters" + has_integral = True + + def _matches(self): + eq = self.ode_problem.eq_preprocessed + f = self.ode_problem.func.func + order = self.ode_problem.order + x = self.ode_problem.sym + match = self.ode_problem.get_linear_coefficients(eq, f(x), order) + self.r = None + does_match = False + + if order and match: + coeff = match[order] + factor = x**order / coeff + self.r = {i: factor*match[i] for i in match} + if self.r and all(_test_term(self.r[i], f(x), i) for i in + self.r if i >= 0): + if self.r[-1]: + does_match = True + + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq + f = self.ode_problem.func.func + x = self.ode_problem.sym + order = self.ode_problem.order + homogen_sol, roots = _get_euler_characteristic_eq_sols(eq, f(x), self.r) + self.r[-1] = self.r[-1]/self.r[order] + sol = _solve_variation_of_parameters(eq, f(x), roots, homogen_sol, order, self.r, simplify_flag) + + return [Eq(f(x), homogen_sol.rhs + (sol.rhs - homogen_sol.rhs)*self.r[order])] + + +class NthLinearEulerEqNonhomogeneousUndeterminedCoefficients(SingleODESolver): + r""" + Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional + ordinary differential equation using undetermined coefficients. + + This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x) + \cdots`. + + These equations can be solved in a general manner, by substituting + solutions of the form `x = exp(t)`, and deriving a characteristic equation + of form `g(exp(t)) = b_0 f(t) + b_1 f'(t) + b_2 f''(t) \cdots` which can + be then solved by nth_linear_constant_coeff_undetermined_coefficients if + g(exp(t)) has finite number of linearly independent derivatives. + + Functions that fit this requirement are finite sums functions of the form + `a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i` + is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For + example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`, + and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have + a finite number of derivatives, because they can be expanded into `\sin(a + x)` and `\cos(b x)` terms. However, SymPy currently cannot do that + expansion, so you will need to manually rewrite the expression in terms of + the above to use this method. So, for example, you will need to manually + convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method + of undetermined coefficients on it. + + After replacement of x by exp(t), this method works by creating a trial function + from the expression and all of its linear independent derivatives and + substituting them into the original ODE. The coefficients for each term + will be a system of linear equations, which are be solved for and + substituted, giving the solution. If any of the trial functions are linearly + dependent on the solution to the homogeneous equation, they are multiplied + by sufficient `x` to make them linearly independent. + + Examples + ======== + + >>> from sympy import dsolve, Function, Derivative, log + >>> from sympy.abc import x + >>> f = Function('f') + >>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - log(x) + >>> dsolve(eq, f(x), + ... hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients').expand() + Eq(f(x), C1*x + C2*x**2 + log(x)/2 + 3/4) + + """ + hint = "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + f = self.ode_problem.func.func + order = self.ode_problem.order + x = self.ode_problem.sym + match = self.ode_problem.get_linear_coefficients(eq, f(x), order) + self.r = None + does_match = False + + if order and match: + coeff = match[order] + factor = x**order / coeff + self.r = {i: factor*match[i] for i in match} + if self.r and all(_test_term(self.r[i], f(x), i) for i in + self.r if i >= 0): + if self.r[-1]: + e, re = posify(self.r[-1].subs(x, exp(x))) + undetcoeff = _undetermined_coefficients_match(e.subs(re), x) + if undetcoeff['test']: + does_match = True + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + f = self.ode_problem.func.func + x = self.ode_problem.sym + chareq, eq, symbol = S.Zero, S.Zero, Dummy('x') + for i in self.r.keys(): + if i >= 0: + chareq += (self.r[i]*diff(x**symbol, x, i)*x**-symbol).expand() + + for i in range(1, degree(Poly(chareq, symbol))+1): + eq += chareq.coeff(symbol**i)*diff(f(x), x, i) + + if chareq.as_coeff_add(symbol)[0]: + eq += chareq.as_coeff_add(symbol)[0]*f(x) + e, re = posify(self.r[-1].subs(x, exp(x))) + eq += e.subs(re) + + self.const_undet_instance = NthLinearConstantCoeffUndeterminedCoefficients(SingleODEProblem(eq, f(x), x)) + sol = self.const_undet_instance.get_general_solution(simplify = simplify_flag)[0] + sol = sol.subs(x, log(x)) # type: ignore + sol = sol.subs(f(log(x)), f(x)).expand() # type: ignore + + return [sol] + + +class SecondLinearBessel(SingleODESolver): + r""" + Gives solution of the Bessel differential equation + + .. math :: x^2 \frac{d^2y}{dx^2} + x \frac{dy}{dx} y(x) + (x^2-n^2) y(x) + + if `n` is integer then the solution is of the form ``Eq(f(x), C0 besselj(n,x) + + C1 bessely(n,x))`` as both the solutions are linearly independent else if + `n` is a fraction then the solution is of the form ``Eq(f(x), C0 besselj(n,x) + + C1 besselj(-n,x))`` which can also transform into ``Eq(f(x), C0 besselj(n,x) + + C1 bessely(n,x))``. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import Symbol + >>> v = Symbol('v', positive=True) + >>> from sympy import dsolve, Function + >>> f = Function('f') + >>> y = f(x) + >>> genform = x**2*y.diff(x, 2) + x*y.diff(x) + (x**2 - v**2)*y + >>> dsolve(genform) + Eq(f(x), C1*besselj(v, x) + C2*bessely(v, x)) + + References + ========== + + https://math24.net/bessel-differential-equation.html + + """ + hint = "2nd_linear_bessel" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + f = self.ode_problem.func + order = self.ode_problem.order + x = self.ode_problem.sym + df = f.diff(x) + a = Wild('a', exclude=[f,df]) + b = Wild('b', exclude=[x, f,df]) + a4 = Wild('a4', exclude=[x,f,df]) + b4 = Wild('b4', exclude=[x,f,df]) + c4 = Wild('c4', exclude=[x,f,df]) + d4 = Wild('d4', exclude=[x,f,df]) + a3 = Wild('a3', exclude=[f, df, f.diff(x, 2)]) + b3 = Wild('b3', exclude=[f, df, f.diff(x, 2)]) + c3 = Wild('c3', exclude=[f, df, f.diff(x, 2)]) + deq = a3*(f.diff(x, 2)) + b3*df + c3*f + r = collect(eq, + [f.diff(x, 2), df, f]).match(deq) + if order == 2 and r: + if not all(r[key].is_polynomial() for key in r): + n, d = eq.as_numer_denom() + eq = expand(n) + r = collect(eq, + [f.diff(x, 2), df, f]).match(deq) + + if r and r[a3] != 0: + # leading coeff of f(x).diff(x, 2) + coeff = factor(r[a3]).match(a4*(x-b)**b4) + + if coeff: + # if coeff[b4] = 0 means constant coefficient + if coeff[b4] == 0: + return False + point = coeff[b] + else: + return False + + if point: + r[a3] = simplify(r[a3].subs(x, x+point)) + r[b3] = simplify(r[b3].subs(x, x+point)) + r[c3] = simplify(r[c3].subs(x, x+point)) + + # making a3 in the form of x**2 + r[a3] = cancel(r[a3]/(coeff[a4]*(x)**(-2+coeff[b4]))) + r[b3] = cancel(r[b3]/(coeff[a4]*(x)**(-2+coeff[b4]))) + r[c3] = cancel(r[c3]/(coeff[a4]*(x)**(-2+coeff[b4]))) + # checking if b3 is of form c*(x-b) + coeff1 = factor(r[b3]).match(a4*(x)) + if coeff1 is None: + return False + # c3 maybe of very complex form so I am simply checking (a - b) form + # if yes later I will match with the standard form of bessel in a and b + # a, b are wild variable defined above. + _coeff2 = expand(r[c3]).match(a - b) + if _coeff2 is None: + return False + # matching with standard form for c3 + coeff2 = factor(_coeff2[a]).match(c4**2*(x)**(2*a4)) + if coeff2 is None: + return False + + if _coeff2[b] == 0: + coeff2[d4] = 0 + else: + coeff2[d4] = factor(_coeff2[b]).match(d4**2)[d4] + + self.rn = {'n':coeff2[d4], 'a4':coeff2[c4], 'd4':coeff2[a4]} + self.rn['c4'] = coeff1[a4] + self.rn['b4'] = point + return True + return False + + def _get_general_solution(self, *, simplify_flag: bool = True): + f = self.ode_problem.func.func + x = self.ode_problem.sym + n = self.rn['n'] + a4 = self.rn['a4'] + c4 = self.rn['c4'] + d4 = self.rn['d4'] + b4 = self.rn['b4'] + n = sqrt(n**2 + Rational(1, 4)*(c4 - 1)**2) + (C1, C2) = self.ode_problem.get_numbered_constants(num=2) + return [Eq(f(x), ((x**(Rational(1-c4,2)))*(C1*besselj(n/d4,a4*x**d4/d4) + + C2*bessely(n/d4,a4*x**d4/d4))).subs(x, x-b4))] + + +class SecondLinearAiry(SingleODESolver): + r""" + Gives solution of the Airy differential equation + + .. math :: \frac{d^2y}{dx^2} + (a + b x) y(x) = 0 + + in terms of Airy special functions airyai and airybi. + + Examples + ======== + + >>> from sympy import dsolve, Function + >>> from sympy.abc import x + >>> f = Function("f") + >>> eq = f(x).diff(x, 2) - x*f(x) + >>> dsolve(eq) + Eq(f(x), C1*airyai(x) + C2*airybi(x)) + """ + hint = "2nd_linear_airy" + has_integral = False + + def _matches(self): + eq = self.ode_problem.eq_high_order_free + f = self.ode_problem.func + order = self.ode_problem.order + x = self.ode_problem.sym + df = f.diff(x) + a4 = Wild('a4', exclude=[x,f,df]) + b4 = Wild('b4', exclude=[x,f,df]) + match = self.ode_problem.get_linear_coefficients(eq, f, order) + does_match = False + if order == 2 and match and match[2] != 0: + if match[1].is_zero: + self.rn = cancel(match[0]/match[2]).match(a4+b4*x) + if self.rn and self.rn[b4] != 0: + self.rn = {'b':self.rn[a4],'m':self.rn[b4]} + does_match = True + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + f = self.ode_problem.func.func + x = self.ode_problem.sym + (C1, C2) = self.ode_problem.get_numbered_constants(num=2) + b = self.rn['b'] + m = self.rn['m'] + if m.is_positive: + arg = - b/cbrt(m)**2 - cbrt(m)*x + elif m.is_negative: + arg = - b/cbrt(-m)**2 + cbrt(-m)*x + else: + arg = - b/cbrt(-m)**2 + cbrt(-m)*x + + return [Eq(f(x), C1*airyai(arg) + C2*airybi(arg))] + + +class LieGroup(SingleODESolver): + r""" + This hint implements the Lie group method of solving first order differential + equations. The aim is to convert the given differential equation from the + given coordinate system into another coordinate system where it becomes + invariant under the one-parameter Lie group of translations. The converted + ODE can be easily solved by quadrature. It makes use of the + :py:meth:`sympy.solvers.ode.infinitesimals` function which returns the + infinitesimals of the transformation. + + The coordinates `r` and `s` can be found by solving the following Partial + Differential Equations. + + .. math :: \xi\frac{\partial r}{\partial x} + \eta\frac{\partial r}{\partial y} + = 0 + + .. math :: \xi\frac{\partial s}{\partial x} + \eta\frac{\partial s}{\partial y} + = 1 + + The differential equation becomes separable in the new coordinate system + + .. math :: \frac{ds}{dr} = \frac{\frac{\partial s}{\partial x} + + h(x, y)\frac{\partial s}{\partial y}}{ + \frac{\partial r}{\partial x} + h(x, y)\frac{\partial r}{\partial y}} + + After finding the solution by integration, it is then converted back to the original + coordinate system by substituting `r` and `s` in terms of `x` and `y` again. + + Examples + ======== + + >>> from sympy import Function, dsolve, exp, pprint + >>> from sympy.abc import x + >>> f = Function('f') + >>> pprint(dsolve(f(x).diff(x) + 2*x*f(x) - x*exp(-x**2), f(x), + ... hint='lie_group')) + / 2\ 2 + | x | -x + f(x) = |C1 + --|*e + \ 2 / + + + References + ========== + + - Solving differential equations by Symmetry Groups, + John Starrett, pp. 1 - pp. 14 + + """ + hint = "lie_group" + has_integral = False + + def _has_additional_params(self): + return 'xi' in self.ode_problem.params and 'eta' in self.ode_problem.params + + def _matches(self): + eq = self.ode_problem.eq + f = self.ode_problem.func.func + order = self.ode_problem.order + x = self.ode_problem.sym + df = f(x).diff(x) + y = Dummy('y') + d = Wild('d', exclude=[df, f(x).diff(x, 2)]) + e = Wild('e', exclude=[df]) + does_match = False + if self._has_additional_params() and order == 1: + xi = self.ode_problem.params['xi'] + eta = self.ode_problem.params['eta'] + self.r3 = {'xi': xi, 'eta': eta} + r = collect(eq, df, exact=True).match(d + e * df) + if r: + r['d'] = d + r['e'] = e + r['y'] = y + r[d] = r[d].subs(f(x), y) + r[e] = r[e].subs(f(x), y) + self.r3.update(r) + does_match = True + return does_match + + def _get_general_solution(self, *, simplify_flag: bool = True): + eq = self.ode_problem.eq + x = self.ode_problem.sym + func = self.ode_problem.func + order = self.ode_problem.order + df = func.diff(x) + + try: + eqsol = solve(eq, df) + except NotImplementedError: + eqsol = [] + + desols = [] + for s in eqsol: + sol = _ode_lie_group(s, func, order, match=self.r3) + if sol: + desols.extend(sol) + + if desols == []: + raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by" + + " the lie group method") + return desols + + +solver_map = { + 'factorable': Factorable, + 'nth_linear_constant_coeff_homogeneous': NthLinearConstantCoeffHomogeneous, + 'nth_linear_euler_eq_homogeneous': NthLinearEulerEqHomogeneous, + 'nth_linear_constant_coeff_undetermined_coefficients': NthLinearConstantCoeffUndeterminedCoefficients, + 'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients': NthLinearEulerEqNonhomogeneousUndeterminedCoefficients, + 'separable': Separable, + '1st_exact': FirstExact, + '1st_linear': FirstLinear, + 'Bernoulli': Bernoulli, + 'Riccati_special_minus2': RiccatiSpecial, + '1st_rational_riccati': RationalRiccati, + '1st_homogeneous_coeff_best': HomogeneousCoeffBest, + '1st_homogeneous_coeff_subs_indep_div_dep': HomogeneousCoeffSubsIndepDivDep, + '1st_homogeneous_coeff_subs_dep_div_indep': HomogeneousCoeffSubsDepDivIndep, + 'almost_linear': AlmostLinear, + 'linear_coefficients': LinearCoefficients, + 'separable_reduced': SeparableReduced, + 'nth_linear_constant_coeff_variation_of_parameters': NthLinearConstantCoeffVariationOfParameters, + 'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters': NthLinearEulerEqNonhomogeneousVariationOfParameters, + 'Liouville': Liouville, + '2nd_linear_airy': SecondLinearAiry, + '2nd_linear_bessel': SecondLinearBessel, + '2nd_hypergeometric': SecondHypergeometric, + 'nth_order_reducible': NthOrderReducible, + '2nd_nonlinear_autonomous_conserved': SecondNonlinearAutonomousConserved, + 'nth_algebraic': NthAlgebraic, + 'lie_group': LieGroup, + } + +# Avoid circular import: +from .ode import dsolve, ode_sol_simplicity, odesimp, homogeneous_order diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/subscheck.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/subscheck.py new file mode 100644 index 0000000000000000000000000000000000000000..6ac7fba7d364bf599e928ccf591b5bef096576d0 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/subscheck.py @@ -0,0 +1,392 @@ +from sympy.core import S, Pow +from sympy.core.function import (Derivative, AppliedUndef, diff) +from sympy.core.relational import Equality, Eq +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify + +from sympy.logic.boolalg import BooleanAtom +from sympy.functions import exp +from sympy.series import Order +from sympy.simplify.simplify import simplify, posify, besselsimp +from sympy.simplify.trigsimp import trigsimp +from sympy.simplify.sqrtdenest import sqrtdenest +from sympy.solvers import solve +from sympy.solvers.deutils import _preprocess, ode_order +from sympy.utilities.iterables import iterable, is_sequence + + +def sub_func_doit(eq, func, new): + r""" + When replacing the func with something else, we usually want the + derivative evaluated, so this function helps in making that happen. + + Examples + ======== + + >>> from sympy import Derivative, symbols, Function + >>> from sympy.solvers.ode.subscheck import sub_func_doit + >>> x, z = symbols('x, z') + >>> y = Function('y') + + >>> sub_func_doit(3*Derivative(y(x), x) - 1, y(x), x) + 2 + + >>> sub_func_doit(x*Derivative(y(x), x) - y(x)**2 + y(x), y(x), + ... 1/(x*(z + 1/x))) + x*(-1/(x**2*(z + 1/x)) + 1/(x**3*(z + 1/x)**2)) + 1/(x*(z + 1/x)) + ...- 1/(x**2*(z + 1/x)**2) + """ + reps= {func: new} + for d in eq.atoms(Derivative): + if d.expr == func: + reps[d] = new.diff(*d.variable_count) + else: + reps[d] = d.xreplace({func: new}).doit(deep=False) + return eq.xreplace(reps) + + +def checkodesol(ode, sol, func=None, order='auto', solve_for_func=True): + r""" + Substitutes ``sol`` into ``ode`` and checks that the result is ``0``. + + This works when ``func`` is one function, like `f(x)` or a list of + functions like `[f(x), g(x)]` when `ode` is a system of ODEs. ``sol`` can + be a single solution or a list of solutions. Each solution may be an + :py:class:`~sympy.core.relational.Equality` that the solution satisfies, + e.g. ``Eq(f(x), C1), Eq(f(x) + C1, 0)``; or simply an + :py:class:`~sympy.core.expr.Expr`, e.g. ``f(x) - C1``. In most cases it + will not be necessary to explicitly identify the function, but if the + function cannot be inferred from the original equation it can be supplied + through the ``func`` argument. + + If a sequence of solutions is passed, the same sort of container will be + used to return the result for each solution. + + It tries the following methods, in order, until it finds zero equivalence: + + 1. Substitute the solution for `f` in the original equation. This only + works if ``ode`` is solved for `f`. It will attempt to solve it first + unless ``solve_for_func == False``. + 2. Take `n` derivatives of the solution, where `n` is the order of + ``ode``, and check to see if that is equal to the solution. This only + works on exact ODEs. + 3. Take the 1st, 2nd, ..., `n`\th derivatives of the solution, each time + solving for the derivative of `f` of that order (this will always be + possible because `f` is a linear operator). Then back substitute each + derivative into ``ode`` in reverse order. + + This function returns a tuple. The first item in the tuple is ``True`` if + the substitution results in ``0``, and ``False`` otherwise. The second + item in the tuple is what the substitution results in. It should always + be ``0`` if the first item is ``True``. Sometimes this function will + return ``False`` even when an expression is identically equal to ``0``. + This happens when :py:meth:`~sympy.simplify.simplify.simplify` does not + reduce the expression to ``0``. If an expression returned by this + function vanishes identically, then ``sol`` really is a solution to + the ``ode``. + + If this function seems to hang, it is probably because of a hard + simplification. + + To use this function to test, test the first item of the tuple. + + Examples + ======== + + >>> from sympy import (Eq, Function, checkodesol, symbols, + ... Derivative, exp) + >>> x, C1, C2 = symbols('x,C1,C2') + >>> f, g = symbols('f g', cls=Function) + >>> checkodesol(f(x).diff(x), Eq(f(x), C1)) + (True, 0) + >>> assert checkodesol(f(x).diff(x), C1)[0] + >>> assert not checkodesol(f(x).diff(x), x)[0] + >>> checkodesol(f(x).diff(x, 2), x**2) + (False, 2) + + >>> eqs = [Eq(Derivative(f(x), x), f(x)), Eq(Derivative(g(x), x), g(x))] + >>> sol = [Eq(f(x), C1*exp(x)), Eq(g(x), C2*exp(x))] + >>> checkodesol(eqs, sol) + (True, [0, 0]) + + """ + if iterable(ode): + return checksysodesol(ode, sol, func=func) + + if not isinstance(ode, Equality): + ode = Eq(ode, 0) + if func is None: + try: + _, func = _preprocess(ode.lhs) + except ValueError: + funcs = [s.atoms(AppliedUndef) for s in ( + sol if is_sequence(sol, set) else [sol])] + funcs = set().union(*funcs) + if len(funcs) != 1: + raise ValueError( + 'must pass func arg to checkodesol for this case.') + func = funcs.pop() + if not isinstance(func, AppliedUndef) or len(func.args) != 1: + raise ValueError( + "func must be a function of one variable, not %s" % func) + if is_sequence(sol, set): + return type(sol)([checkodesol(ode, i, order=order, solve_for_func=solve_for_func) for i in sol]) + + if not isinstance(sol, Equality): + sol = Eq(func, sol) + elif sol.rhs == func: + sol = sol.reversed + + if order == 'auto': + order = ode_order(ode, func) + solved = sol.lhs == func and not sol.rhs.has(func) + if solve_for_func and not solved: + rhs = solve(sol, func) + if rhs: + eqs = [Eq(func, t) for t in rhs] + if len(rhs) == 1: + eqs = eqs[0] + return checkodesol(ode, eqs, order=order, + solve_for_func=False) + + x = func.args[0] + + # Handle series solutions here + if sol.has(Order): + assert sol.lhs == func + Oterm = sol.rhs.getO() + solrhs = sol.rhs.removeO() + + Oexpr = Oterm.expr + assert isinstance(Oexpr, Pow) + sorder = Oexpr.exp + assert Oterm == Order(x**sorder) + + odesubs = (ode.lhs-ode.rhs).subs(func, solrhs).doit().expand() + + neworder = Order(x**(sorder - order)) + odesubs = odesubs + neworder + assert odesubs.getO() == neworder + residual = odesubs.removeO() + + return (residual == 0, residual) + + s = True + testnum = 0 + while s: + if testnum == 0: + # First pass, try substituting a solved solution directly into the + # ODE. This has the highest chance of succeeding. + ode_diff = ode.lhs - ode.rhs + + if sol.lhs == func: + s = sub_func_doit(ode_diff, func, sol.rhs) + s = besselsimp(s) + else: + testnum += 1 + continue + ss = simplify(s.rewrite(exp)) + if ss: + # with the new numer_denom in power.py, if we do a simple + # expansion then testnum == 0 verifies all solutions. + s = ss.expand(force=True) + else: + s = 0 + testnum += 1 + elif testnum == 1: + # Second pass. If we cannot substitute f, try seeing if the nth + # derivative is equal, this will only work for odes that are exact, + # by definition. + s = simplify( + trigsimp(diff(sol.lhs, x, order) - diff(sol.rhs, x, order)) - + trigsimp(ode.lhs) + trigsimp(ode.rhs)) + # s2 = simplify( + # diff(sol.lhs, x, order) - diff(sol.rhs, x, order) - \ + # ode.lhs + ode.rhs) + testnum += 1 + elif testnum == 2: + # Third pass. Try solving for df/dx and substituting that into the + # ODE. Thanks to Chris Smith for suggesting this method. Many of + # the comments below are his, too. + # The method: + # - Take each of 1..n derivatives of the solution. + # - Solve each nth derivative for d^(n)f/dx^(n) + # (the differential of that order) + # - Back substitute into the ODE in decreasing order + # (i.e., n, n-1, ...) + # - Check the result for zero equivalence + if sol.lhs == func and not sol.rhs.has(func): + diffsols = {0: sol.rhs} + elif sol.rhs == func and not sol.lhs.has(func): + diffsols = {0: sol.lhs} + else: + diffsols = {} + sol = sol.lhs - sol.rhs + for i in range(1, order + 1): + # Differentiation is a linear operator, so there should always + # be 1 solution. Nonetheless, we test just to make sure. + # We only need to solve once. After that, we automatically + # have the solution to the differential in the order we want. + if i == 1: + ds = sol.diff(x) + try: + sdf = solve(ds, func.diff(x, i)) + if not sdf: + raise NotImplementedError + except NotImplementedError: + testnum += 1 + break + else: + diffsols[i] = sdf[0] + else: + # This is what the solution says df/dx should be. + diffsols[i] = diffsols[i - 1].diff(x) + + # Make sure the above didn't fail. + if testnum > 2: + continue + else: + # Substitute it into ODE to check for self consistency. + lhs, rhs = ode.lhs, ode.rhs + for i in range(order, -1, -1): + if i == 0 and 0 not in diffsols: + # We can only substitute f(x) if the solution was + # solved for f(x). + break + lhs = sub_func_doit(lhs, func.diff(x, i), diffsols[i]) + rhs = sub_func_doit(rhs, func.diff(x, i), diffsols[i]) + ode_or_bool = Eq(lhs, rhs) + ode_or_bool = simplify(ode_or_bool) + + if isinstance(ode_or_bool, (bool, BooleanAtom)): + if ode_or_bool: + lhs = rhs = S.Zero + else: + lhs = ode_or_bool.lhs + rhs = ode_or_bool.rhs + # No sense in overworking simplify -- just prove that the + # numerator goes to zero + num = trigsimp((lhs - rhs).as_numer_denom()[0]) + # since solutions are obtained using force=True we test + # using the same level of assumptions + ## replace function with dummy so assumptions will work + _func = Dummy('func') + num = num.subs(func, _func) + ## posify the expression + num, reps = posify(num) + s = simplify(num).xreplace(reps).xreplace({_func: func}) + testnum += 1 + else: + break + + if not s: + return (True, s) + elif s is True: # The code above never was able to change s + raise NotImplementedError("Unable to test if " + str(sol) + + " is a solution to " + str(ode) + ".") + else: + return (False, s) + + +def checksysodesol(eqs, sols, func=None): + r""" + Substitutes corresponding ``sols`` for each functions into each ``eqs`` and + checks that the result of substitutions for each equation is ``0``. The + equations and solutions passed can be any iterable. + + This only works when each ``sols`` have one function only, like `x(t)` or `y(t)`. + For each function, ``sols`` can have a single solution or a list of solutions. + In most cases it will not be necessary to explicitly identify the function, + but if the function cannot be inferred from the original equation it + can be supplied through the ``func`` argument. + + When a sequence of equations is passed, the same sequence is used to return + the result for each equation with each function substituted with corresponding + solutions. + + It tries the following method to find zero equivalence for each equation: + + Substitute the solutions for functions, like `x(t)` and `y(t)` into the + original equations containing those functions. + This function returns a tuple. The first item in the tuple is ``True`` if + the substitution results for each equation is ``0``, and ``False`` otherwise. + The second item in the tuple is what the substitution results in. Each element + of the ``list`` should always be ``0`` corresponding to each equation if the + first item is ``True``. Note that sometimes this function may return ``False``, + but with an expression that is identically equal to ``0``, instead of returning + ``True``. This is because :py:meth:`~sympy.simplify.simplify.simplify` cannot + reduce the expression to ``0``. If an expression returned by each function + vanishes identically, then ``sols`` really is a solution to ``eqs``. + + If this function seems to hang, it is probably because of a difficult simplification. + + Examples + ======== + + >>> from sympy import Eq, diff, symbols, sin, cos, exp, sqrt, S, Function + >>> from sympy.solvers.ode.subscheck import checksysodesol + >>> C1, C2 = symbols('C1:3') + >>> t = symbols('t') + >>> x, y = symbols('x, y', cls=Function) + >>> eq = (Eq(diff(x(t),t), x(t) + y(t) + 17), Eq(diff(y(t),t), -2*x(t) + y(t) + 12)) + >>> sol = [Eq(x(t), (C1*sin(sqrt(2)*t) + C2*cos(sqrt(2)*t))*exp(t) - S(5)/3), + ... Eq(y(t), (sqrt(2)*C1*cos(sqrt(2)*t) - sqrt(2)*C2*sin(sqrt(2)*t))*exp(t) - S(46)/3)] + >>> checksysodesol(eq, sol) + (True, [0, 0]) + >>> eq = (Eq(diff(x(t),t),x(t)*y(t)**4), Eq(diff(y(t),t),y(t)**3)) + >>> sol = [Eq(x(t), C1*exp(-1/(4*(C2 + t)))), Eq(y(t), -sqrt(2)*sqrt(-1/(C2 + t))/2), + ... Eq(x(t), C1*exp(-1/(4*(C2 + t)))), Eq(y(t), sqrt(2)*sqrt(-1/(C2 + t))/2)] + >>> checksysodesol(eq, sol) + (True, [0, 0]) + + """ + def _sympify(eq): + return list(map(sympify, eq if iterable(eq) else [eq])) + eqs = _sympify(eqs) + for i in range(len(eqs)): + if isinstance(eqs[i], Equality): + eqs[i] = eqs[i].lhs - eqs[i].rhs + if func is None: + funcs = [] + for eq in eqs: + derivs = eq.atoms(Derivative) + func = set().union(*[d.atoms(AppliedUndef) for d in derivs]) + funcs.extend(func) + funcs = list(set(funcs)) + if not all(isinstance(func, AppliedUndef) and len(func.args) == 1 for func in funcs)\ + and len({func.args for func in funcs})!=1: + raise ValueError("func must be a function of one variable, not %s" % func) + for sol in sols: + if len(sol.atoms(AppliedUndef)) != 1: + raise ValueError("solutions should have one function only") + if len(funcs) != len({sol.lhs for sol in sols}): + raise ValueError("number of solutions provided does not match the number of equations") + dictsol = {} + for sol in sols: + func = list(sol.atoms(AppliedUndef))[0] + if sol.rhs == func: + sol = sol.reversed + solved = sol.lhs == func and not sol.rhs.has(func) + if not solved: + rhs = solve(sol, func) + if not rhs: + raise NotImplementedError + else: + rhs = sol.rhs + dictsol[func] = rhs + checkeq = [] + for eq in eqs: + for func in funcs: + eq = sub_func_doit(eq, func, dictsol[func]) + ss = simplify(eq) + if ss != 0: + eq = ss.expand(force=True) + if eq != 0: + eq = sqrtdenest(eq).simplify() + else: + eq = 0 + checkeq.append(eq) + if len(set(checkeq)) == 1 and list(set(checkeq))[0] == 0: + return (True, checkeq) + else: + return (False, checkeq) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/systems.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/systems.py new file mode 100644 index 0000000000000000000000000000000000000000..2d2c9b57a969c7fb5c67c06ce952fa398e22a48d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/systems.py @@ -0,0 +1,2135 @@ +from sympy.core import Add, Mul, S +from sympy.core.containers import Tuple +from sympy.core.exprtools import factor_terms +from sympy.core.numbers import I +from sympy.core.relational import Eq, Equality +from sympy.core.sorting import default_sort_key, ordered +from sympy.core.symbol import Dummy, Symbol +from sympy.core.function import (expand_mul, expand, Derivative, + AppliedUndef, Function, Subs) +from sympy.functions import (exp, im, cos, sin, re, Piecewise, + piecewise_fold, sqrt, log) +from sympy.functions.combinatorial.factorials import factorial +from sympy.matrices import zeros, Matrix, NonSquareMatrixError, MatrixBase, eye +from sympy.polys import Poly, together +from sympy.simplify import collect, radsimp, signsimp # type: ignore +from sympy.simplify.powsimp import powdenest, powsimp +from sympy.simplify.ratsimp import ratsimp +from sympy.simplify.simplify import simplify +from sympy.sets.sets import FiniteSet +from sympy.solvers.deutils import ode_order +from sympy.solvers.solveset import NonlinearError, solveset +from sympy.utilities.iterables import (connected_components, iterable, + strongly_connected_components) +from sympy.utilities.misc import filldedent +from sympy.integrals.integrals import Integral, integrate + + +def _get_func_order(eqs, funcs): + return {func: max(ode_order(eq, func) for eq in eqs) for func in funcs} + + +class ODEOrderError(ValueError): + """Raised by linear_ode_to_matrix if the system has the wrong order""" + pass + + +class ODENonlinearError(NonlinearError): + """Raised by linear_ode_to_matrix if the system is nonlinear""" + pass + + +def _simpsol(soleq): + lhs = soleq.lhs + sol = soleq.rhs + sol = powsimp(sol) + gens = list(sol.atoms(exp)) + p = Poly(sol, *gens, expand=False) + gens = [factor_terms(g) for g in gens] + if not gens: + gens = p.gens + syms = [Symbol('C1'), Symbol('C2')] + terms = [] + for coeff, monom in zip(p.coeffs(), p.monoms()): + coeff = piecewise_fold(coeff) + if isinstance(coeff, Piecewise): + coeff = Piecewise(*((ratsimp(coef).collect(syms), cond) for coef, cond in coeff.args)) + else: + coeff = ratsimp(coeff).collect(syms) + monom = Mul(*(g ** i for g, i in zip(gens, monom))) + terms.append(coeff * monom) + return Eq(lhs, Add(*terms)) + + +def _solsimp(e, t): + no_t, has_t = powsimp(expand_mul(e)).as_independent(t) + + no_t = ratsimp(no_t) + has_t = has_t.replace(exp, lambda a: exp(factor_terms(a))) + + return no_t + has_t + + +def simpsol(sol, wrt1, wrt2, doit=True): + """Simplify solutions from dsolve_system.""" + + # The parameter sol is the solution as returned by dsolve (list of Eq). + # + # The parameters wrt1 and wrt2 are lists of symbols to be collected for + # with those in wrt1 being collected for first. This allows for collecting + # on any factors involving the independent variable before collecting on + # the integration constants or vice versa using e.g.: + # + # sol = simpsol(sol, [t], [C1, C2]) # t first, constants after + # sol = simpsol(sol, [C1, C2], [t]) # constants first, t after + # + # If doit=True (default) then simpsol will begin by evaluating any + # unevaluated integrals. Since many integrals will appear multiple times + # in the solutions this is done intelligently by computing each integral + # only once. + # + # The strategy is to first perform simple cancellation with factor_terms + # and then multiply out all brackets with expand_mul. This gives an Add + # with many terms. + # + # We split each term into two multiplicative factors dep and coeff where + # all factors that involve wrt1 are in dep and any constant factors are in + # coeff e.g. + # sqrt(2)*C1*exp(t) -> ( exp(t), sqrt(2)*C1 ) + # + # The dep factors are simplified using powsimp to combine expanded + # exponential factors e.g. + # exp(a*t)*exp(b*t) -> exp(t*(a+b)) + # + # We then collect coefficients for all terms having the same (simplified) + # dep. The coefficients are then simplified using together and ratsimp and + # lastly by recursively applying the same transformation to the + # coefficients to collect on wrt2. + # + # Finally the result is recombined into an Add and signsimp is used to + # normalise any minus signs. + + def simprhs(rhs, rep, wrt1, wrt2): + """Simplify the rhs of an ODE solution""" + if rep: + rhs = rhs.subs(rep) + rhs = factor_terms(rhs) + rhs = simp_coeff_dep(rhs, wrt1, wrt2) + rhs = signsimp(rhs) + return rhs + + def simp_coeff_dep(expr, wrt1, wrt2=None): + """Split rhs into terms, split terms into dep and coeff and collect on dep""" + add_dep_terms = lambda e: e.is_Add and e.has(*wrt1) + expandable = lambda e: e.is_Mul and any(map(add_dep_terms, e.args)) + expand_func = lambda e: expand_mul(e, deep=False) + expand_mul_mod = lambda e: e.replace(expandable, expand_func) + terms = Add.make_args(expand_mul_mod(expr)) + dc = {} + for term in terms: + coeff, dep = term.as_independent(*wrt1, as_Add=False) + # Collect together the coefficients for terms that have the same + # dependence on wrt1 (after dep is normalised using simpdep). + dep = simpdep(dep, wrt1) + + # See if the dependence on t cancels out... + if dep is not S.One: + dep2 = factor_terms(dep) + if not dep2.has(*wrt1): + coeff *= dep2 + dep = S.One + + if dep not in dc: + dc[dep] = coeff + else: + dc[dep] += coeff + # Apply the method recursively to the coefficients but this time + # collecting on wrt2 rather than wrt2. + termpairs = ((simpcoeff(c, wrt2), d) for d, c in dc.items()) + if wrt2 is not None: + termpairs = ((simp_coeff_dep(c, wrt2), d) for c, d in termpairs) + return Add(*(c * d for c, d in termpairs)) + + def simpdep(term, wrt1): + """Normalise factors involving t with powsimp and recombine exp""" + def canonicalise(a): + # Using factor_terms here isn't quite right because it leads to things + # like exp(t*(1+t)) that we don't want. We do want to cancel factors + # and pull out a common denominator but ideally the numerator would be + # expressed as a standard form polynomial in t so we expand_mul + # and collect afterwards. + a = factor_terms(a) + num, den = a.as_numer_denom() + num = expand_mul(num) + num = collect(num, wrt1) + return num / den + + term = powsimp(term) + rep = {e: exp(canonicalise(e.args[0])) for e in term.atoms(exp)} + term = term.subs(rep) + return term + + def simpcoeff(coeff, wrt2): + """Bring to a common fraction and cancel with ratsimp""" + coeff = together(coeff) + if coeff.is_polynomial(): + # Calling ratsimp can be expensive. The main reason is to simplify + # sums of terms with irrational denominators so we limit ourselves + # to the case where the expression is polynomial in any symbols. + # Maybe there's a better approach... + coeff = ratsimp(radsimp(coeff)) + # collect on secondary variables first and any remaining symbols after + if wrt2 is not None: + syms = list(wrt2) + list(ordered(coeff.free_symbols - set(wrt2))) + else: + syms = list(ordered(coeff.free_symbols)) + coeff = collect(coeff, syms) + coeff = together(coeff) + return coeff + + # There are often repeated integrals. Collect unique integrals and + # evaluate each once and then substitute into the final result to replace + # all occurrences in each of the solution equations. + if doit: + integrals = set().union(*(s.atoms(Integral) for s in sol)) + rep = {i: factor_terms(i).doit() for i in integrals} + else: + rep = {} + + sol = [Eq(s.lhs, simprhs(s.rhs, rep, wrt1, wrt2)) for s in sol] + return sol + + +def linodesolve_type(A, t, b=None): + r""" + Helper function that determines the type of the system of ODEs for solving with :obj:`sympy.solvers.ode.systems.linodesolve()` + + Explanation + =========== + + This function takes in the coefficient matrix and/or the non-homogeneous term + and returns the type of the equation that can be solved by :obj:`sympy.solvers.ode.systems.linodesolve()`. + + If the system is constant coefficient homogeneous, then "type1" is returned + + If the system is constant coefficient non-homogeneous, then "type2" is returned + + If the system is non-constant coefficient homogeneous, then "type3" is returned + + If the system is non-constant coefficient non-homogeneous, then "type4" is returned + + If the system has a non-constant coefficient matrix which can be factorized into constant + coefficient matrix, then "type5" or "type6" is returned for when the system is homogeneous or + non-homogeneous respectively. + + Note that, if the system of ODEs is of "type3" or "type4", then along with the type, + the commutative antiderivative of the coefficient matrix is also returned. + + If the system cannot be solved by :obj:`sympy.solvers.ode.systems.linodesolve()`, then + NotImplementedError is raised. + + Parameters + ========== + + A : Matrix + Coefficient matrix of the system of ODEs + b : Matrix or None + Non-homogeneous term of the system. The default value is None. + If this argument is None, then the system is assumed to be homogeneous. + + Examples + ======== + + >>> from sympy import symbols, Matrix + >>> from sympy.solvers.ode.systems import linodesolve_type + >>> t = symbols("t") + >>> A = Matrix([[1, 1], [2, 3]]) + >>> b = Matrix([t, 1]) + + >>> linodesolve_type(A, t) + {'antiderivative': None, 'type_of_equation': 'type1'} + + >>> linodesolve_type(A, t, b=b) + {'antiderivative': None, 'type_of_equation': 'type2'} + + >>> A_t = Matrix([[1, t], [-t, 1]]) + + >>> linodesolve_type(A_t, t) + {'antiderivative': Matrix([ + [ t, t**2/2], + [-t**2/2, t]]), 'type_of_equation': 'type3'} + + >>> linodesolve_type(A_t, t, b=b) + {'antiderivative': Matrix([ + [ t, t**2/2], + [-t**2/2, t]]), 'type_of_equation': 'type4'} + + >>> A_non_commutative = Matrix([[1, t], [t, -1]]) + >>> linodesolve_type(A_non_commutative, t) + Traceback (most recent call last): + ... + NotImplementedError: + The system does not have a commutative antiderivative, it cannot be + solved by linodesolve. + + Returns + ======= + + Dict + + Raises + ====== + + NotImplementedError + When the coefficient matrix does not have a commutative antiderivative + + See Also + ======== + + linodesolve: Function for which linodesolve_type gets the information + + """ + + match = {} + is_non_constant = not _matrix_is_constant(A, t) + is_non_homogeneous = not (b is None or b.is_zero_matrix) + type = "type{}".format(int("{}{}".format(int(is_non_constant), int(is_non_homogeneous)), 2) + 1) + + B = None + match.update({"type_of_equation": type, "antiderivative": B}) + + if is_non_constant: + B, is_commuting = _is_commutative_anti_derivative(A, t) + if not is_commuting: + raise NotImplementedError(filldedent(''' + The system does not have a commutative antiderivative, it cannot be solved + by linodesolve. + ''')) + + match['antiderivative'] = B + match.update(_first_order_type5_6_subs(A, t, b=b)) + + return match + + +def _first_order_type5_6_subs(A, t, b=None): + match = {} + + factor_terms = _factor_matrix(A, t) + is_homogeneous = b is None or b.is_zero_matrix + + if factor_terms is not None: + t_ = Symbol("{}_".format(t)) + F_t = integrate(factor_terms[0], t) + inverse = solveset(Eq(t_, F_t), t) + + # Note: A simple way to check if a function is invertible + # or not. + if isinstance(inverse, FiniteSet) and not inverse.has(Piecewise)\ + and len(inverse) == 1: + + A = factor_terms[1] + if not is_homogeneous: + b = b / factor_terms[0] + b = b.subs(t, list(inverse)[0]) + type = "type{}".format(5 + (not is_homogeneous)) + match.update({'func_coeff': A, 'tau': F_t, + 't_': t_, 'type_of_equation': type, 'rhs': b}) + + return match + + +def linear_ode_to_matrix(eqs, funcs, t, order): + r""" + Convert a linear system of ODEs to matrix form + + Explanation + =========== + + Express a system of linear ordinary differential equations as a single + matrix differential equation [1]. For example the system $x' = x + y + 1$ + and $y' = x - y$ can be represented as + + .. math:: A_1 X' = A_0 X + b + + where $A_1$ and $A_0$ are $2 \times 2$ matrices and $b$, $X$ and $X'$ are + $2 \times 1$ matrices with $X = [x, y]^T$. + + Higher-order systems are represented with additional matrices e.g. a + second-order system would look like + + .. math:: A_2 X'' = A_1 X' + A_0 X + b + + Examples + ======== + + >>> from sympy import Function, Symbol, Matrix, Eq + >>> from sympy.solvers.ode.systems import linear_ode_to_matrix + >>> t = Symbol('t') + >>> x = Function('x') + >>> y = Function('y') + + We can create a system of linear ODEs like + + >>> eqs = [ + ... Eq(x(t).diff(t), x(t) + y(t) + 1), + ... Eq(y(t).diff(t), x(t) - y(t)), + ... ] + >>> funcs = [x(t), y(t)] + >>> order = 1 # 1st order system + + Now ``linear_ode_to_matrix`` can represent this as a matrix + differential equation. + + >>> (A1, A0), b = linear_ode_to_matrix(eqs, funcs, t, order) + >>> A1 + Matrix([ + [1, 0], + [0, 1]]) + >>> A0 + Matrix([ + [1, 1], + [1, -1]]) + >>> b + Matrix([ + [1], + [0]]) + + The original equations can be recovered from these matrices: + + >>> eqs_mat = Matrix([eq.lhs - eq.rhs for eq in eqs]) + >>> X = Matrix(funcs) + >>> A1 * X.diff(t) - A0 * X - b == eqs_mat + True + + If the system of equations has a maximum order greater than the + order of the system specified, a ODEOrderError exception is raised. + + >>> eqs = [Eq(x(t).diff(t, 2), x(t).diff(t) + x(t)), Eq(y(t).diff(t), y(t) + x(t))] + >>> linear_ode_to_matrix(eqs, funcs, t, 1) + Traceback (most recent call last): + ... + ODEOrderError: Cannot represent system in 1-order form + + If the system of equations is nonlinear, then ODENonlinearError is + raised. + + >>> eqs = [Eq(x(t).diff(t), x(t) + y(t)), Eq(y(t).diff(t), y(t)**2 + x(t))] + >>> linear_ode_to_matrix(eqs, funcs, t, 1) + Traceback (most recent call last): + ... + ODENonlinearError: The system of ODEs is nonlinear. + + Parameters + ========== + + eqs : list of SymPy expressions or equalities + The equations as expressions (assumed equal to zero). + funcs : list of applied functions + The dependent variables of the system of ODEs. + t : symbol + The independent variable. + order : int + The order of the system of ODEs. + + Returns + ======= + + The tuple ``(As, b)`` where ``As`` is a tuple of matrices and ``b`` is the + the matrix representing the rhs of the matrix equation. + + Raises + ====== + + ODEOrderError + When the system of ODEs have an order greater than what was specified + ODENonlinearError + When the system of ODEs is nonlinear + + See Also + ======== + + linear_eq_to_matrix: for systems of linear algebraic equations. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Matrix_differential_equation + + """ + from sympy.solvers.solveset import linear_eq_to_matrix + + if any(ode_order(eq, func) > order for eq in eqs for func in funcs): + msg = "Cannot represent system in {}-order form" + raise ODEOrderError(msg.format(order)) + + As = [] + + for o in range(order, -1, -1): + # Work from the highest derivative down + syms = [func.diff(t, o) for func in funcs] + + # Ai is the matrix for X(t).diff(t, o) + # eqs is minus the remainder of the equations. + try: + Ai, b = linear_eq_to_matrix(eqs, syms) + except NonlinearError: + raise ODENonlinearError("The system of ODEs is nonlinear.") + + Ai = Ai.applyfunc(expand_mul) + + As.append(Ai if o == order else -Ai) + + if o: + eqs = [-eq for eq in b] + else: + rhs = b + + return As, rhs + + +def matrix_exp(A, t): + r""" + Matrix exponential $\exp(A*t)$ for the matrix ``A`` and scalar ``t``. + + Explanation + =========== + + This functions returns the $\exp(A*t)$ by doing a simple + matrix multiplication: + + .. math:: \exp(A*t) = P * expJ * P^{-1} + + where $expJ$ is $\exp(J*t)$. $J$ is the Jordan normal + form of $A$ and $P$ is matrix such that: + + .. math:: A = P * J * P^{-1} + + The matrix exponential $\exp(A*t)$ appears in the solution of linear + differential equations. For example if $x$ is a vector and $A$ is a matrix + then the initial value problem + + .. math:: \frac{dx(t)}{dt} = A \times x(t), x(0) = x0 + + has the unique solution + + .. math:: x(t) = \exp(A t) x0 + + Examples + ======== + + >>> from sympy import Symbol, Matrix, pprint + >>> from sympy.solvers.ode.systems import matrix_exp + >>> t = Symbol('t') + + We will consider a 2x2 matrix for comupting the exponential + + >>> A = Matrix([[2, -5], [2, -4]]) + >>> pprint(A) + [2 -5] + [ ] + [2 -4] + + Now, exp(A*t) is given as follows: + + >>> pprint(matrix_exp(A, t)) + [ -t -t -t ] + [3*e *sin(t) + e *cos(t) -5*e *sin(t) ] + [ ] + [ -t -t -t ] + [ 2*e *sin(t) - 3*e *sin(t) + e *cos(t)] + + Parameters + ========== + + A : Matrix + The matrix $A$ in the expression $\exp(A*t)$ + t : Symbol + The independent variable + + See Also + ======== + + matrix_exp_jordan_form: For exponential of Jordan normal form + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Jordan_normal_form + .. [2] https://en.wikipedia.org/wiki/Matrix_exponential + + """ + P, expJ = matrix_exp_jordan_form(A, t) + return P * expJ * P.inv() + + +def matrix_exp_jordan_form(A, t): + r""" + Matrix exponential $\exp(A*t)$ for the matrix *A* and scalar *t*. + + Explanation + =========== + + Returns the Jordan form of the $\exp(A*t)$ along with the matrix $P$ such that: + + .. math:: + \exp(A*t) = P * expJ * P^{-1} + + Examples + ======== + + >>> from sympy import Matrix, Symbol + >>> from sympy.solvers.ode.systems import matrix_exp, matrix_exp_jordan_form + >>> t = Symbol('t') + + We will consider a 2x2 defective matrix. This shows that our method + works even for defective matrices. + + >>> A = Matrix([[1, 1], [0, 1]]) + + It can be observed that this function gives us the Jordan normal form + and the required invertible matrix P. + + >>> P, expJ = matrix_exp_jordan_form(A, t) + + Here, it is shown that P and expJ returned by this function is correct + as they satisfy the formula: P * expJ * P_inverse = exp(A*t). + + >>> P * expJ * P.inv() == matrix_exp(A, t) + True + + Parameters + ========== + + A : Matrix + The matrix $A$ in the expression $\exp(A*t)$ + t : Symbol + The independent variable + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Defective_matrix + .. [2] https://en.wikipedia.org/wiki/Jordan_matrix + .. [3] https://en.wikipedia.org/wiki/Jordan_normal_form + + """ + + N, M = A.shape + if N != M: + raise ValueError('Needed square matrix but got shape (%s, %s)' % (N, M)) + elif A.has(t): + raise ValueError('Matrix A should not depend on t') + + def jordan_chains(A): + '''Chains from Jordan normal form analogous to M.eigenvects(). + Returns a dict with eignevalues as keys like: + {e1: [[v111,v112,...], [v121, v122,...]], e2:...} + where vijk is the kth vector in the jth chain for eigenvalue i. + ''' + P, blocks = A.jordan_cells() + basis = [P[:,i] for i in range(P.shape[1])] + n = 0 + chains = {} + for b in blocks: + eigval = b[0, 0] + size = b.shape[0] + if eigval not in chains: + chains[eigval] = [] + chains[eigval].append(basis[n:n+size]) + n += size + return chains + + eigenchains = jordan_chains(A) + + # Needed for consistency across Python versions + eigenchains_iter = sorted(eigenchains.items(), key=default_sort_key) + isreal = not A.has(I) + + blocks = [] + vectors = [] + seen_conjugate = set() + for e, chains in eigenchains_iter: + for chain in chains: + n = len(chain) + if isreal and e != e.conjugate() and e.conjugate() in eigenchains: + if e in seen_conjugate: + continue + seen_conjugate.add(e.conjugate()) + exprt = exp(re(e) * t) + imrt = im(e) * t + imblock = Matrix([[cos(imrt), sin(imrt)], + [-sin(imrt), cos(imrt)]]) + expJblock2 = Matrix(n, n, lambda i,j: + imblock * t**(j-i) / factorial(j-i) if j >= i + else zeros(2, 2)) + expJblock = Matrix(2*n, 2*n, lambda i,j: expJblock2[i//2,j//2][i%2,j%2]) + + blocks.append(exprt * expJblock) + for i in range(n): + vectors.append(re(chain[i])) + vectors.append(im(chain[i])) + else: + vectors.extend(chain) + fun = lambda i,j: t**(j-i)/factorial(j-i) if j >= i else 0 + expJblock = Matrix(n, n, fun) + blocks.append(exp(e * t) * expJblock) + + expJ = Matrix.diag(*blocks) + P = Matrix(N, N, lambda i,j: vectors[j][i]) + + return P, expJ + + +# Note: To add a docstring example with tau +def linodesolve(A, t, b=None, B=None, type="auto", doit=False, + tau=None): + r""" + System of n equations linear first-order differential equations + + Explanation + =========== + + This solver solves the system of ODEs of the following form: + + .. math:: + X'(t) = A(t) X(t) + b(t) + + Here, $A(t)$ is the coefficient matrix, $X(t)$ is the vector of n independent variables, + $b(t)$ is the non-homogeneous term and $X'(t)$ is the derivative of $X(t)$ + + Depending on the properties of $A(t)$ and $b(t)$, this solver evaluates the solution + differently. + + When $A(t)$ is constant coefficient matrix and $b(t)$ is zero vector i.e. system is homogeneous, + the system is "type1". The solution is: + + .. math:: + X(t) = \exp(A t) C + + Here, $C$ is a vector of constants and $A$ is the constant coefficient matrix. + + When $A(t)$ is constant coefficient matrix and $b(t)$ is non-zero i.e. system is non-homogeneous, + the system is "type2". The solution is: + + .. math:: + X(t) = e^{A t} ( \int e^{- A t} b \,dt + C) + + When $A(t)$ is coefficient matrix such that its commutative with its antiderivative $B(t)$ and + $b(t)$ is a zero vector i.e. system is homogeneous, the system is "type3". The solution is: + + .. math:: + X(t) = \exp(B(t)) C + + When $A(t)$ is commutative with its antiderivative $B(t)$ and $b(t)$ is non-zero i.e. system is + non-homogeneous, the system is "type4". The solution is: + + .. math:: + X(t) = e^{B(t)} ( \int e^{-B(t)} b(t) \,dt + C) + + When $A(t)$ is a coefficient matrix such that it can be factorized into a scalar and a constant + coefficient matrix: + + .. math:: + A(t) = f(t) * A + + Where $f(t)$ is a scalar expression in the independent variable $t$ and $A$ is a constant matrix, + then we can do the following substitutions: + + .. math:: + tau = \int f(t) dt, X(t) = Y(tau), b(t) = b(f^{-1}(tau)) + + Here, the substitution for the non-homogeneous term is done only when its non-zero. + Using these substitutions, our original system becomes: + + .. math:: + Y'(tau) = A * Y(tau) + b(tau)/f(tau) + + The above system can be easily solved using the solution for "type1" or "type2" depending + on the homogeneity of the system. After we get the solution for $Y(tau)$, we substitute the + solution for $tau$ as $t$ to get back $X(t)$ + + .. math:: + X(t) = Y(tau) + + Systems of "type5" and "type6" have a commutative antiderivative but we use this solution + because its faster to compute. + + The final solution is the general solution for all the four equations since a constant coefficient + matrix is always commutative with its antidervative. + + An additional feature of this function is, if someone wants to substitute for value of the independent + variable, they can pass the substitution `tau` and the solution will have the independent variable + substituted with the passed expression(`tau`). + + Parameters + ========== + + A : Matrix + Coefficient matrix of the system of linear first order ODEs. + t : Symbol + Independent variable in the system of ODEs. + b : Matrix or None + Non-homogeneous term in the system of ODEs. If None is passed, + a homogeneous system of ODEs is assumed. + B : Matrix or None + Antiderivative of the coefficient matrix. If the antiderivative + is not passed and the solution requires the term, then the solver + would compute it internally. + type : String + Type of the system of ODEs passed. Depending on the type, the + solution is evaluated. The type values allowed and the corresponding + system it solves are: "type1" for constant coefficient homogeneous + "type2" for constant coefficient non-homogeneous, "type3" for non-constant + coefficient homogeneous, "type4" for non-constant coefficient non-homogeneous, + "type5" and "type6" for non-constant coefficient homogeneous and non-homogeneous + systems respectively where the coefficient matrix can be factorized to a constant + coefficient matrix. + The default value is "auto" which will let the solver decide the correct type of + the system passed. + doit : Boolean + Evaluate the solution if True, default value is False + tau: Expression + Used to substitute for the value of `t` after we get the solution of the system. + + Examples + ======== + + To solve the system of ODEs using this function directly, several things must be + done in the right order. Wrong inputs to the function will lead to incorrect results. + + >>> from sympy import symbols, Function, Eq + >>> from sympy.solvers.ode.systems import canonical_odes, linear_ode_to_matrix, linodesolve, linodesolve_type + >>> from sympy.solvers.ode.subscheck import checkodesol + >>> f, g = symbols("f, g", cls=Function) + >>> x, a = symbols("x, a") + >>> funcs = [f(x), g(x)] + >>> eqs = [Eq(f(x).diff(x) - f(x), a*g(x) + 1), Eq(g(x).diff(x) + g(x), a*f(x))] + + Here, it is important to note that before we derive the coefficient matrix, it is + important to get the system of ODEs into the desired form. For that we will use + :obj:`sympy.solvers.ode.systems.canonical_odes()`. + + >>> eqs = canonical_odes(eqs, funcs, x) + >>> eqs + [[Eq(Derivative(f(x), x), a*g(x) + f(x) + 1), Eq(Derivative(g(x), x), a*f(x) - g(x))]] + + Now, we will use :obj:`sympy.solvers.ode.systems.linear_ode_to_matrix()` to get the coefficient matrix and the + non-homogeneous term if it is there. + + >>> eqs = eqs[0] + >>> (A1, A0), b = linear_ode_to_matrix(eqs, funcs, x, 1) + >>> A = A0 + + We have the coefficient matrices and the non-homogeneous term ready. Now, we can use + :obj:`sympy.solvers.ode.systems.linodesolve_type()` to get the information for the system of ODEs + to finally pass it to the solver. + + >>> system_info = linodesolve_type(A, x, b=b) + >>> sol_vector = linodesolve(A, x, b=b, B=system_info['antiderivative'], type=system_info['type_of_equation']) + + Now, we can prove if the solution is correct or not by using :obj:`sympy.solvers.ode.checkodesol()` + + >>> sol = [Eq(f, s) for f, s in zip(funcs, sol_vector)] + >>> checkodesol(eqs, sol) + (True, [0, 0]) + + We can also use the doit method to evaluate the solutions passed by the function. + + >>> sol_vector_evaluated = linodesolve(A, x, b=b, type="type2", doit=True) + + Now, we will look at a system of ODEs which is non-constant. + + >>> eqs = [Eq(f(x).diff(x), f(x) + x*g(x)), Eq(g(x).diff(x), -x*f(x) + g(x))] + + The system defined above is already in the desired form, so we do not have to convert it. + + >>> (A1, A0), b = linear_ode_to_matrix(eqs, funcs, x, 1) + >>> A = A0 + + A user can also pass the commutative antiderivative required for type3 and type4 system of ODEs. + Passing an incorrect one will lead to incorrect results. If the coefficient matrix is not commutative + with its antiderivative, then :obj:`sympy.solvers.ode.systems.linodesolve_type()` raises a NotImplementedError. + If it does have a commutative antiderivative, then the function just returns the information about the system. + + >>> system_info = linodesolve_type(A, x, b=b) + + Now, we can pass the antiderivative as an argument to get the solution. If the system information is not + passed, then the solver will compute the required arguments internally. + + >>> sol_vector = linodesolve(A, x, b=b) + + Once again, we can verify the solution obtained. + + >>> sol = [Eq(f, s) for f, s in zip(funcs, sol_vector)] + >>> checkodesol(eqs, sol) + (True, [0, 0]) + + Returns + ======= + + List + + Raises + ====== + + ValueError + This error is raised when the coefficient matrix, non-homogeneous term + or the antiderivative, if passed, are not a matrix or + do not have correct dimensions + NonSquareMatrixError + When the coefficient matrix or its antiderivative, if passed is not a + square matrix + NotImplementedError + If the coefficient matrix does not have a commutative antiderivative + + See Also + ======== + + linear_ode_to_matrix: Coefficient matrix computation function + canonical_odes: System of ODEs representation change + linodesolve_type: Getting information about systems of ODEs to pass in this solver + + """ + + if not isinstance(A, MatrixBase): + raise ValueError(filldedent('''\ + The coefficients of the system of ODEs should be of type Matrix + ''')) + + if not A.is_square: + raise NonSquareMatrixError(filldedent('''\ + The coefficient matrix must be a square + ''')) + + if b is not None: + if not isinstance(b, MatrixBase): + raise ValueError(filldedent('''\ + The non-homogeneous terms of the system of ODEs should be of type Matrix + ''')) + + if A.rows != b.rows: + raise ValueError(filldedent('''\ + The system of ODEs should have the same number of non-homogeneous terms and the number of + equations + ''')) + + if B is not None: + if not isinstance(B, MatrixBase): + raise ValueError(filldedent('''\ + The antiderivative of coefficients of the system of ODEs should be of type Matrix + ''')) + + if not B.is_square: + raise NonSquareMatrixError(filldedent('''\ + The antiderivative of the coefficient matrix must be a square + ''')) + + if A.rows != B.rows: + raise ValueError(filldedent('''\ + The coefficient matrix and its antiderivative should have same dimensions + ''')) + + if not any(type == "type{}".format(i) for i in range(1, 7)) and not type == "auto": + raise ValueError(filldedent('''\ + The input type should be a valid one + ''')) + + n = A.rows + + # constants = numbered_symbols(prefix='C', cls=Dummy, start=const_idx+1) + Cvect = Matrix([Dummy() for _ in range(n)]) + + if b is None and any(type == typ for typ in ["type2", "type4", "type6"]): + b = zeros(n, 1) + + is_transformed = tau is not None + passed_type = type + + if type == "auto": + system_info = linodesolve_type(A, t, b=b) + type = system_info["type_of_equation"] + B = system_info["antiderivative"] + + if type in ("type5", "type6"): + is_transformed = True + if passed_type != "auto": + if tau is None: + system_info = _first_order_type5_6_subs(A, t, b=b) + if not system_info: + raise ValueError(filldedent(''' + The system passed isn't {}. + '''.format(type))) + + tau = system_info['tau'] + t = system_info['t_'] + A = system_info['A'] + b = system_info['b'] + + intx_wrtt = lambda x: Integral(x, t) if x else 0 + if type in ("type1", "type2", "type5", "type6"): + P, J = matrix_exp_jordan_form(A, t) + P = simplify(P) + + if type in ("type1", "type5"): + sol_vector = P * (J * Cvect) + else: + Jinv = J.subs(t, -t) + sol_vector = P * J * ((Jinv * P.inv() * b).applyfunc(intx_wrtt) + Cvect) + else: + if B is None: + B, _ = _is_commutative_anti_derivative(A, t) + + if type == "type3": + sol_vector = B.exp() * Cvect + else: + sol_vector = B.exp() * (((-B).exp() * b).applyfunc(intx_wrtt) + Cvect) + + if is_transformed: + sol_vector = sol_vector.subs(t, tau) + + gens = sol_vector.atoms(exp) + + if type != "type1": + sol_vector = [expand_mul(s) for s in sol_vector] + + sol_vector = [collect(s, ordered(gens), exact=True) for s in sol_vector] + + if doit: + sol_vector = [s.doit() for s in sol_vector] + + return sol_vector + + +def _matrix_is_constant(M, t): + """Checks if the matrix M is independent of t or not.""" + return all(coef.as_independent(t, as_Add=True)[1] == 0 for coef in M) + + +def canonical_odes(eqs, funcs, t): + r""" + Function that solves for highest order derivatives in a system + + Explanation + =========== + + This function inputs a system of ODEs and based on the system, + the dependent variables and their highest order, returns the system + in the following form: + + .. math:: + X'(t) = A(t) X(t) + b(t) + + Here, $X(t)$ is the vector of dependent variables of lower order, $A(t)$ is + the coefficient matrix, $b(t)$ is the non-homogeneous term and $X'(t)$ is the + vector of dependent variables in their respective highest order. We use the term + canonical form to imply the system of ODEs which is of the above form. + + If the system passed has a non-linear term with multiple solutions, then a list of + systems is returned in its canonical form. + + Parameters + ========== + + eqs : List + List of the ODEs + funcs : List + List of dependent variables + t : Symbol + Independent variable + + Examples + ======== + + >>> from sympy import symbols, Function, Eq, Derivative + >>> from sympy.solvers.ode.systems import canonical_odes + >>> f, g = symbols("f g", cls=Function) + >>> x, y = symbols("x y") + >>> funcs = [f(x), g(x)] + >>> eqs = [Eq(f(x).diff(x) - 7*f(x), 12*g(x)), Eq(g(x).diff(x) + g(x), 20*f(x))] + + >>> canonical_eqs = canonical_odes(eqs, funcs, x) + >>> canonical_eqs + [[Eq(Derivative(f(x), x), 7*f(x) + 12*g(x)), Eq(Derivative(g(x), x), 20*f(x) - g(x))]] + + >>> system = [Eq(Derivative(f(x), x)**2 - 2*Derivative(f(x), x) + 1, 4), Eq(-y*f(x) + Derivative(g(x), x), 0)] + + >>> canonical_system = canonical_odes(system, funcs, x) + >>> canonical_system + [[Eq(Derivative(f(x), x), -1), Eq(Derivative(g(x), x), y*f(x))], [Eq(Derivative(f(x), x), 3), Eq(Derivative(g(x), x), y*f(x))]] + + Returns + ======= + + List + + """ + from sympy.solvers.solvers import solve + + order = _get_func_order(eqs, funcs) + + canon_eqs = solve(eqs, *[func.diff(t, order[func]) for func in funcs], dict=True) + + systems = [] + for eq in canon_eqs: + system = [Eq(func.diff(t, order[func]), eq[func.diff(t, order[func])]) for func in funcs] + systems.append(system) + + return systems + + +def _is_commutative_anti_derivative(A, t): + r""" + Helper function for determining if the Matrix passed is commutative with its antiderivative + + Explanation + =========== + + This function checks if the Matrix $A$ passed is commutative with its antiderivative with respect + to the independent variable $t$. + + .. math:: + B(t) = \int A(t) dt + + The function outputs two values, first one being the antiderivative $B(t)$, second one being a + boolean value, if True, then the matrix $A(t)$ passed is commutative with $B(t)$, else the matrix + passed isn't commutative with $B(t)$. + + Parameters + ========== + + A : Matrix + The matrix which has to be checked + t : Symbol + Independent variable + + Examples + ======== + + >>> from sympy import symbols, Matrix + >>> from sympy.solvers.ode.systems import _is_commutative_anti_derivative + >>> t = symbols("t") + >>> A = Matrix([[1, t], [-t, 1]]) + + >>> B, is_commuting = _is_commutative_anti_derivative(A, t) + >>> is_commuting + True + + Returns + ======= + + Matrix, Boolean + + """ + B = integrate(A, t) + is_commuting = (B*A - A*B).applyfunc(expand).applyfunc(factor_terms).is_zero_matrix + + is_commuting = False if is_commuting is None else is_commuting + + return B, is_commuting + + +def _factor_matrix(A, t): + term = None + for element in A: + temp_term = element.as_independent(t)[1] + if temp_term.has(t): + term = temp_term + break + + if term is not None: + A_factored = (A/term).applyfunc(ratsimp) + can_factor = _matrix_is_constant(A_factored, t) + term = (term, A_factored) if can_factor else None + + return term + + +def _is_second_order_type2(A, t): + term = _factor_matrix(A, t) + is_type2 = False + + if term is not None: + term = 1/term[0] + is_type2 = term.is_polynomial() + + if is_type2: + poly = Poly(term.expand(), t) + monoms = poly.monoms() + + if monoms[0][0] in (2, 4): + cs = _get_poly_coeffs(poly, 4) + a, b, c, d, e = cs + + a1 = powdenest(sqrt(a), force=True) + c1 = powdenest(sqrt(e), force=True) + b1 = powdenest(sqrt(c - 2*a1*c1), force=True) + + is_type2 = (b == 2*a1*b1) and (d == 2*b1*c1) + term = a1*t**2 + b1*t + c1 + + else: + is_type2 = False + + return is_type2, term + + +def _get_poly_coeffs(poly, order): + cs = [0 for _ in range(order+1)] + for c, m in zip(poly.coeffs(), poly.monoms()): + cs[-1-m[0]] = c + return cs + + +def _match_second_order_type(A1, A0, t, b=None): + r""" + Works only for second order system in its canonical form. + + Type 0: Constant coefficient matrix, can be simply solved by + introducing dummy variables. + Type 1: When the substitution: $U = t*X' - X$ works for reducing + the second order system to first order system. + Type 2: When the system is of the form: $poly * X'' = A*X$ where + $poly$ is square of a quadratic polynomial with respect to + *t* and $A$ is a constant coefficient matrix. + + """ + match = {"type_of_equation": "type0"} + n = A1.shape[0] + + if _matrix_is_constant(A1, t) and _matrix_is_constant(A0, t): + return match + + if (A1 + A0*t).applyfunc(expand_mul).is_zero_matrix: + match.update({"type_of_equation": "type1", "A1": A1}) + + elif A1.is_zero_matrix and (b is None or b.is_zero_matrix): + is_type2, term = _is_second_order_type2(A0, t) + if is_type2: + a, b, c = _get_poly_coeffs(Poly(term, t), 2) + A = (A0*(term**2).expand()).applyfunc(ratsimp) + (b**2/4 - a*c)*eye(n, n) + tau = integrate(1/term, t) + t_ = Symbol("{}_".format(t)) + match.update({"type_of_equation": "type2", "A0": A, + "g(t)": sqrt(term), "tau": tau, "is_transformed": True, + "t_": t_}) + + return match + + +def _second_order_subs_type1(A, b, funcs, t): + r""" + For a linear, second order system of ODEs, a particular substitution. + + A system of the below form can be reduced to a linear first order system of + ODEs: + .. math:: + X'' = A(t) * (t*X' - X) + b(t) + + By substituting: + .. math:: U = t*X' - X + + To get the system: + .. math:: U' = t*(A(t)*U + b(t)) + + Where $U$ is the vector of dependent variables, $X$ is the vector of dependent + variables in `funcs` and $X'$ is the first order derivative of $X$ with respect to + $t$. It may or may not reduce the system into linear first order system of ODEs. + + Then a check is made to determine if the system passed can be reduced or not, if + this substitution works, then the system is reduced and its solved for the new + substitution. After we get the solution for $U$: + + .. math:: U = a(t) + + We substitute and return the reduced system: + + .. math:: + a(t) = t*X' - X + + Parameters + ========== + + A: Matrix + Coefficient matrix($A(t)*t$) of the second order system of this form. + b: Matrix + Non-homogeneous term($b(t)$) of the system of ODEs. + funcs: List + List of dependent variables + t: Symbol + Independent variable of the system of ODEs. + + Returns + ======= + + List + + """ + + U = Matrix([t*func.diff(t) - func for func in funcs]) + + sol = linodesolve(A, t, t*b) + reduced_eqs = [Eq(u, s) for s, u in zip(sol, U)] + reduced_eqs = canonical_odes(reduced_eqs, funcs, t)[0] + + return reduced_eqs + + +def _second_order_subs_type2(A, funcs, t_): + r""" + Returns a second order system based on the coefficient matrix passed. + + Explanation + =========== + + This function returns a system of second order ODE of the following form: + + .. math:: + X'' = A * X + + Here, $X$ is the vector of dependent variables, but a bit modified, $A$ is the + coefficient matrix passed. + + Along with returning the second order system, this function also returns the new + dependent variables with the new independent variable `t_` passed. + + Parameters + ========== + + A: Matrix + Coefficient matrix of the system + funcs: List + List of old dependent variables + t_: Symbol + New independent variable + + Returns + ======= + + List, List + + """ + func_names = [func.func.__name__ for func in funcs] + new_funcs = [Function(Dummy("{}_".format(name)))(t_) for name in func_names] + rhss = A * Matrix(new_funcs) + new_eqs = [Eq(func.diff(t_, 2), rhs) for func, rhs in zip(new_funcs, rhss)] + + return new_eqs, new_funcs + + +def _is_euler_system(As, t): + return all(_matrix_is_constant((A*t**i).applyfunc(ratsimp), t) for i, A in enumerate(As)) + + +def _classify_linear_system(eqs, funcs, t, is_canon=False): + r""" + Returns a dictionary with details of the eqs if the system passed is linear + and can be classified by this function else returns None + + Explanation + =========== + + This function takes the eqs, converts it into a form Ax = b where x is a vector of terms + containing dependent variables and their derivatives till their maximum order. If it is + possible to convert eqs into Ax = b, then all the equations in eqs are linear otherwise + they are non-linear. + + To check if the equations are constant coefficient, we need to check if all the terms in + A obtained above are constant or not. + + To check if the equations are homogeneous or not, we need to check if b is a zero matrix + or not. + + Parameters + ========== + + eqs: List + List of ODEs + funcs: List + List of dependent variables + t: Symbol + Independent variable of the equations in eqs + is_canon: Boolean + If True, then this function will not try to get the + system in canonical form. Default value is False + + Returns + ======= + + match = { + 'no_of_equation': len(eqs), + 'eq': eqs, + 'func': funcs, + 'order': order, + 'is_linear': is_linear, + 'is_constant': is_constant, + 'is_homogeneous': is_homogeneous, + } + + Dict or list of Dicts or None + Dict with values for keys: + 1. no_of_equation: Number of equations + 2. eq: The set of equations + 3. func: List of dependent variables + 4. order: A dictionary that gives the order of the + dependent variable in eqs + 5. is_linear: Boolean value indicating if the set of + equations are linear or not. + 6. is_constant: Boolean value indicating if the set of + equations have constant coefficients or not. + 7. is_homogeneous: Boolean value indicating if the set of + equations are homogeneous or not. + 8. commutative_antiderivative: Antiderivative of the coefficient + matrix if the coefficient matrix is non-constant + and commutative with its antiderivative. This key + may or may not exist. + 9. is_general: Boolean value indicating if the system of ODEs is + solvable using one of the general case solvers or not. + 10. rhs: rhs of the non-homogeneous system of ODEs in Matrix form. This + key may or may not exist. + 11. is_higher_order: True if the system passed has an order greater than 1. + This key may or may not exist. + 12. is_second_order: True if the system passed is a second order ODE. This + key may or may not exist. + This Dict is the answer returned if the eqs are linear and constant + coefficient. Otherwise, None is returned. + + """ + + # Error for i == 0 can be added but isn't for now + + # Check for len(funcs) == len(eqs) + if len(funcs) != len(eqs): + raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs) + + # ValueError when functions have more than one arguments + for func in funcs: + if len(func.args) != 1: + raise ValueError("dsolve() and classify_sysode() work with " + "functions of one variable only, not %s" % func) + + # Getting the func_dict and order using the helper + # function + order = _get_func_order(eqs, funcs) + system_order = max(order[func] for func in funcs) + is_higher_order = system_order > 1 + is_second_order = system_order == 2 and all(order[func] == 2 for func in funcs) + + # Not adding the check if the len(func.args) for + # every func in funcs is 1 + + # Linearity check + try: + + canon_eqs = canonical_odes(eqs, funcs, t) if not is_canon else [eqs] + if len(canon_eqs) == 1: + As, b = linear_ode_to_matrix(canon_eqs[0], funcs, t, system_order) + else: + + match = { + 'is_implicit': True, + 'canon_eqs': canon_eqs + } + + return match + + # When the system of ODEs is non-linear, an ODENonlinearError is raised. + # This function catches the error and None is returned. + except ODENonlinearError: + return None + + is_linear = True + + # Homogeneous check + is_homogeneous = True if b.is_zero_matrix else False + + # Is general key is used to identify if the system of ODEs can be solved by + # one of the general case solvers or not. + match = { + 'no_of_equation': len(eqs), + 'eq': eqs, + 'func': funcs, + 'order': order, + 'is_linear': is_linear, + 'is_homogeneous': is_homogeneous, + 'is_general': True + } + + if not is_homogeneous: + match['rhs'] = b + + is_constant = all(_matrix_is_constant(A_, t) for A_ in As) + + # The match['is_linear'] check will be added in the future when this + # function becomes ready to deal with non-linear systems of ODEs + + if not is_higher_order: + A = As[1] + match['func_coeff'] = A + + # Constant coefficient check + is_constant = _matrix_is_constant(A, t) + match['is_constant'] = is_constant + + try: + system_info = linodesolve_type(A, t, b=b) + except NotImplementedError: + return None + + match.update(system_info) + antiderivative = match.pop("antiderivative") + + if not is_constant: + match['commutative_antiderivative'] = antiderivative + + return match + else: + match['type_of_equation'] = "type0" + + if is_second_order: + A1, A0 = As[1:] + + match_second_order = _match_second_order_type(A1, A0, t) + match.update(match_second_order) + + match['is_second_order'] = True + + # If system is constant, then no need to check if its in euler + # form or not. It will be easier and faster to directly proceed + # to solve it. + if match['type_of_equation'] == "type0" and not is_constant: + is_euler = _is_euler_system(As, t) + if is_euler: + t_ = Symbol('{}_'.format(t)) + match.update({'is_transformed': True, 'type_of_equation': 'type1', + 't_': t_}) + else: + is_jordan = lambda M: M == Matrix.jordan_block(M.shape[0], M[0, 0]) + terms = _factor_matrix(As[-1], t) + if all(A.is_zero_matrix for A in As[1:-1]) and terms is not None and not is_jordan(terms[1]): + P, J = terms[1].jordan_form() + match.update({'type_of_equation': 'type2', 'J': J, + 'f(t)': terms[0], 'P': P, 'is_transformed': True}) + + if match['type_of_equation'] != 'type0' and is_second_order: + match.pop('is_second_order', None) + + match['is_higher_order'] = is_higher_order + + return match + +def _preprocess_eqs(eqs): + processed_eqs = [] + for eq in eqs: + processed_eqs.append(eq if isinstance(eq, Equality) else Eq(eq, 0)) + + return processed_eqs + + +def _eqs2dict(eqs, funcs): + eqsorig = {} + eqsmap = {} + funcset = set(funcs) + for eq in eqs: + f1, = eq.lhs.atoms(AppliedUndef) + f2s = (eq.rhs.atoms(AppliedUndef) - {f1}) & funcset + eqsmap[f1] = f2s + eqsorig[f1] = eq + return eqsmap, eqsorig + + +def _dict2graph(d): + nodes = list(d) + edges = [(f1, f2) for f1, f2s in d.items() for f2 in f2s] + G = (nodes, edges) + return G + + +def _is_type1(scc, t): + eqs, funcs = scc + + try: + (A1, A0), b = linear_ode_to_matrix(eqs, funcs, t, 1) + except (ODENonlinearError, ODEOrderError): + return False + + if _matrix_is_constant(A0, t) and b.is_zero_matrix: + return True + + return False + + +def _combine_type1_subsystems(subsystem, funcs, t): + indices = [i for i, sys in enumerate(zip(subsystem, funcs)) if _is_type1(sys, t)] + remove = set() + for ip, i in enumerate(indices): + for j in indices[ip+1:]: + if any(eq2.has(funcs[i]) for eq2 in subsystem[j]): + subsystem[j] = subsystem[i] + subsystem[j] + remove.add(i) + subsystem = [sys for i, sys in enumerate(subsystem) if i not in remove] + return subsystem + + +def _component_division(eqs, funcs, t): + + # Assuming that each eq in eqs is in canonical form, + # that is, [f(x).diff(x) = .., g(x).diff(x) = .., etc] + # and that the system passed is in its first order + eqsmap, eqsorig = _eqs2dict(eqs, funcs) + + subsystems = [] + for cc in connected_components(_dict2graph(eqsmap)): + eqsmap_c = {f: eqsmap[f] for f in cc} + sccs = strongly_connected_components(_dict2graph(eqsmap_c)) + subsystem = [[eqsorig[f] for f in scc] for scc in sccs] + subsystem = _combine_type1_subsystems(subsystem, sccs, t) + subsystems.append(subsystem) + + return subsystems + + +# Returns: List of equations +def _linear_ode_solver(match): + t = match['t'] + funcs = match['func'] + + rhs = match.get('rhs', None) + tau = match.get('tau', None) + t = match['t_'] if 't_' in match else t + A = match['func_coeff'] + + # Note: To make B None when the matrix has constant + # coefficient + B = match.get('commutative_antiderivative', None) + type = match['type_of_equation'] + + sol_vector = linodesolve(A, t, b=rhs, B=B, + type=type, tau=tau) + + sol = [Eq(f, s) for f, s in zip(funcs, sol_vector)] + + return sol + + +def _select_equations(eqs, funcs, key=lambda x: x): + eq_dict = {e.lhs: e.rhs for e in eqs} + return [Eq(f, eq_dict[key(f)]) for f in funcs] + + +def _higher_order_ode_solver(match): + eqs = match["eq"] + funcs = match["func"] + t = match["t"] + sysorder = match['order'] + type = match.get('type_of_equation', "type0") + + is_second_order = match.get('is_second_order', False) + is_transformed = match.get('is_transformed', False) + is_euler = is_transformed and type == "type1" + is_higher_order_type2 = is_transformed and type == "type2" and 'P' in match + + if is_second_order: + new_eqs, new_funcs = _second_order_to_first_order(eqs, funcs, t, + A1=match.get("A1", None), A0=match.get("A0", None), + b=match.get("rhs", None), type=type, + t_=match.get("t_", None)) + else: + new_eqs, new_funcs = _higher_order_to_first_order(eqs, sysorder, t, funcs=funcs, + type=type, J=match.get('J', None), + f_t=match.get('f(t)', None), + P=match.get('P', None), b=match.get('rhs', None)) + + if is_transformed: + t = match.get('t_', t) + + if not is_higher_order_type2: + new_eqs = _select_equations(new_eqs, [f.diff(t) for f in new_funcs]) + + sol = None + + # NotImplementedError may be raised when the system may be actually + # solvable if it can be just divided into sub-systems + try: + if not is_higher_order_type2: + sol = _strong_component_solver(new_eqs, new_funcs, t) + except NotImplementedError: + sol = None + + # Dividing the system only when it becomes essential + if sol is None: + try: + sol = _component_solver(new_eqs, new_funcs, t) + except NotImplementedError: + sol = None + + if sol is None: + return sol + + is_second_order_type2 = is_second_order and type == "type2" + + underscores = '__' if is_transformed else '_' + + sol = _select_equations(sol, funcs, + key=lambda x: Function(Dummy('{}{}0'.format(x.func.__name__, underscores)))(t)) + + if match.get("is_transformed", False): + if is_second_order_type2: + g_t = match["g(t)"] + tau = match["tau"] + sol = [Eq(s.lhs, s.rhs.subs(t, tau) * g_t) for s in sol] + elif is_euler: + t = match['t'] + tau = match['t_'] + sol = [s.subs(tau, log(t)) for s in sol] + elif is_higher_order_type2: + P = match['P'] + sol_vector = P * Matrix([s.rhs for s in sol]) + sol = [Eq(f, s) for f, s in zip(funcs, sol_vector)] + + return sol + + +# Returns: List of equations or None +# If None is returned by this solver, then the system +# of ODEs cannot be solved directly by dsolve_system. +def _strong_component_solver(eqs, funcs, t): + from sympy.solvers.ode.ode import dsolve, constant_renumber + + match = _classify_linear_system(eqs, funcs, t, is_canon=True) + sol = None + + # Assuming that we can't get an implicit system + # since we are already canonical equations from + # dsolve_system + if match: + match['t'] = t + + if match.get('is_higher_order', False): + sol = _higher_order_ode_solver(match) + + elif match.get('is_linear', False): + sol = _linear_ode_solver(match) + + # Note: For now, only linear systems are handled by this function + # hence, the match condition is added. This can be removed later. + if sol is None and len(eqs) == 1: + sol = dsolve(eqs[0], func=funcs[0]) + variables = Tuple(eqs[0]).free_symbols + new_constants = [Dummy() for _ in range(ode_order(eqs[0], funcs[0]))] + sol = constant_renumber(sol, variables=variables, newconstants=new_constants) + sol = [sol] + + # To add non-linear case here in future + + return sol + + +def _get_funcs_from_canon(eqs): + return [eq.lhs.args[0] for eq in eqs] + + +# Returns: List of Equations(a solution) +def _weak_component_solver(wcc, t): + + # We will divide the systems into sccs + # only when the wcc cannot be solved as + # a whole + eqs = [] + for scc in wcc: + eqs += scc + funcs = _get_funcs_from_canon(eqs) + + sol = _strong_component_solver(eqs, funcs, t) + if sol: + return sol + + sol = [] + + for scc in wcc: + eqs = scc + funcs = _get_funcs_from_canon(eqs) + + # Substituting solutions for the dependent + # variables solved in previous SCC, if any solved. + comp_eqs = [eq.subs({s.lhs: s.rhs for s in sol}) for eq in eqs] + scc_sol = _strong_component_solver(comp_eqs, funcs, t) + + if scc_sol is None: + raise NotImplementedError(filldedent(''' + The system of ODEs passed cannot be solved by dsolve_system. + ''')) + + # scc_sol: List of equations + # scc_sol is a solution + sol += scc_sol + + return sol + + +# Returns: List of Equations(a solution) +def _component_solver(eqs, funcs, t): + components = _component_division(eqs, funcs, t) + sol = [] + + for wcc in components: + + # wcc_sol: List of Equations + sol += _weak_component_solver(wcc, t) + + # sol: List of Equations + return sol + + +def _second_order_to_first_order(eqs, funcs, t, type="auto", A1=None, + A0=None, b=None, t_=None): + r""" + Expects the system to be in second order and in canonical form + + Explanation + =========== + + Reduces a second order system into a first order one depending on the type of second + order system. + 1. "type0": If this is passed, then the system will be reduced to first order by + introducing dummy variables. + 2. "type1": If this is passed, then a particular substitution will be used to reduce the + the system into first order. + 3. "type2": If this is passed, then the system will be transformed with new dependent + variables and independent variables. This transformation is a part of solving + the corresponding system of ODEs. + + `A1` and `A0` are the coefficient matrices from the system and it is assumed that the + second order system has the form given below: + + .. math:: + A2 * X'' = A1 * X' + A0 * X + b + + Here, $A2$ is the coefficient matrix for the vector $X''$ and $b$ is the non-homogeneous + term. + + Default value for `b` is None but if `A1` and `A0` are passed and `b` is not passed, then the + system will be assumed homogeneous. + + """ + is_a1 = A1 is None + is_a0 = A0 is None + + if (type == "type1" and is_a1) or (type == "type2" and is_a0)\ + or (type == "auto" and (is_a1 or is_a0)): + (A2, A1, A0), b = linear_ode_to_matrix(eqs, funcs, t, 2) + + if not A2.is_Identity: + raise ValueError(filldedent(''' + The system must be in its canonical form. + ''')) + + if type == "auto": + match = _match_second_order_type(A1, A0, t) + type = match["type_of_equation"] + A1 = match.get("A1", None) + A0 = match.get("A0", None) + + sys_order = dict.fromkeys(funcs, 2) + + if type == "type1": + if b is None: + b = zeros(len(eqs)) + eqs = _second_order_subs_type1(A1, b, funcs, t) + sys_order = dict.fromkeys(funcs, 1) + + if type == "type2": + if t_ is None: + t_ = Symbol("{}_".format(t)) + t = t_ + eqs, funcs = _second_order_subs_type2(A0, funcs, t_) + sys_order = dict.fromkeys(funcs, 2) + + return _higher_order_to_first_order(eqs, sys_order, t, funcs=funcs) + + +def _higher_order_type2_to_sub_systems(J, f_t, funcs, t, max_order, b=None, P=None): + + # Note: To add a test for this ValueError + if J is None or f_t is None or not _matrix_is_constant(J, t): + raise ValueError(filldedent(''' + Correctly input for args 'A' and 'f_t' for Linear, Higher Order, + Type 2 + ''')) + + if P is None and b is not None and not b.is_zero_matrix: + raise ValueError(filldedent(''' + Provide the keyword 'P' for matrix P in A = P * J * P-1. + ''')) + + new_funcs = Matrix([Function(Dummy('{}__0'.format(f.func.__name__)))(t) for f in funcs]) + new_eqs = new_funcs.diff(t, max_order) - f_t * J * new_funcs + + if b is not None and not b.is_zero_matrix: + new_eqs -= P.inv() * b + + new_eqs = canonical_odes(new_eqs, new_funcs, t)[0] + + return new_eqs, new_funcs + + +def _higher_order_to_first_order(eqs, sys_order, t, funcs=None, type="type0", **kwargs): + if funcs is None: + funcs = sys_order.keys() + + # Standard Cauchy Euler system + if type == "type1": + t_ = Symbol('{}_'.format(t)) + new_funcs = [Function(Dummy('{}_'.format(f.func.__name__)))(t_) for f in funcs] + max_order = max(sys_order[func] for func in funcs) + subs_dict = dict(zip(funcs, new_funcs)) + subs_dict[t] = exp(t_) + + free_function = Function(Dummy()) + + def _get_coeffs_from_subs_expression(expr): + if isinstance(expr, Subs): + free_symbol = expr.args[1][0] + term = expr.args[0] + return {ode_order(term, free_symbol): 1} + + if isinstance(expr, Mul): + coeff = expr.args[0] + order = list(_get_coeffs_from_subs_expression(expr.args[1]).keys())[0] + return {order: coeff} + + if isinstance(expr, Add): + coeffs = {} + for arg in expr.args: + + if isinstance(arg, Mul): + coeffs.update(_get_coeffs_from_subs_expression(arg)) + + else: + order = list(_get_coeffs_from_subs_expression(arg).keys())[0] + coeffs[order] = 1 + + return coeffs + + for o in range(1, max_order + 1): + expr = free_function(log(t_)).diff(t_, o)*t_**o + coeff_dict = _get_coeffs_from_subs_expression(expr) + coeffs = [coeff_dict[order] if order in coeff_dict else 0 for order in range(o + 1)] + expr_to_subs = sum(free_function(t_).diff(t_, i) * c for i, c in + enumerate(coeffs)) / t**o + subs_dict.update({f.diff(t, o): expr_to_subs.subs(free_function(t_), nf) + for f, nf in zip(funcs, new_funcs)}) + + new_eqs = [eq.subs(subs_dict) for eq in eqs] + new_sys_order = {nf: sys_order[f] for f, nf in zip(funcs, new_funcs)} + + new_eqs = canonical_odes(new_eqs, new_funcs, t_)[0] + + return _higher_order_to_first_order(new_eqs, new_sys_order, t_, funcs=new_funcs) + + # Systems of the form: X(n)(t) = f(t)*A*X + b + # where X(n)(t) is the nth derivative of the vector of dependent variables + # with respect to the independent variable and A is a constant matrix. + if type == "type2": + J = kwargs.get('J', None) + f_t = kwargs.get('f_t', None) + b = kwargs.get('b', None) + P = kwargs.get('P', None) + max_order = max(sys_order[func] for func in funcs) + + return _higher_order_type2_to_sub_systems(J, f_t, funcs, t, max_order, P=P, b=b) + + # Note: To be changed to this after doit option is disabled for default cases + # new_sysorder = _get_func_order(new_eqs, new_funcs) + # + # return _higher_order_to_first_order(new_eqs, new_sysorder, t, funcs=new_funcs) + + new_funcs = [] + + for prev_func in funcs: + func_name = prev_func.func.__name__ + func = Function(Dummy('{}_0'.format(func_name)))(t) + new_funcs.append(func) + subs_dict = {prev_func: func} + new_eqs = [] + + for i in range(1, sys_order[prev_func]): + new_func = Function(Dummy('{}_{}'.format(func_name, i)))(t) + subs_dict[prev_func.diff(t, i)] = new_func + new_funcs.append(new_func) + + prev_f = subs_dict[prev_func.diff(t, i-1)] + new_eq = Eq(prev_f.diff(t), new_func) + new_eqs.append(new_eq) + + eqs = [eq.subs(subs_dict) for eq in eqs] + new_eqs + + return eqs, new_funcs + + +def dsolve_system(eqs, funcs=None, t=None, ics=None, doit=False, simplify=True): + r""" + Solves any(supported) system of Ordinary Differential Equations + + Explanation + =========== + + This function takes a system of ODEs as an input, determines if the + it is solvable by this function, and returns the solution if found any. + + This function can handle: + 1. Linear, First Order, Constant coefficient homogeneous system of ODEs + 2. Linear, First Order, Constant coefficient non-homogeneous system of ODEs + 3. Linear, First Order, non-constant coefficient homogeneous system of ODEs + 4. Linear, First Order, non-constant coefficient non-homogeneous system of ODEs + 5. Any implicit system which can be divided into system of ODEs which is of the above 4 forms + 6. Any higher order linear system of ODEs that can be reduced to one of the 5 forms of systems described above. + + The types of systems described above are not limited by the number of equations, i.e. this + function can solve the above types irrespective of the number of equations in the system passed. + But, the bigger the system, the more time it will take to solve the system. + + This function returns a list of solutions. Each solution is a list of equations where LHS is + the dependent variable and RHS is an expression in terms of the independent variable. + + Among the non constant coefficient types, not all the systems are solvable by this function. Only + those which have either a coefficient matrix with a commutative antiderivative or those systems which + may be divided further so that the divided systems may have coefficient matrix with commutative antiderivative. + + Parameters + ========== + + eqs : List + system of ODEs to be solved + funcs : List or None + List of dependent variables that make up the system of ODEs + t : Symbol or None + Independent variable in the system of ODEs + ics : Dict or None + Set of initial boundary/conditions for the system of ODEs + doit : Boolean + Evaluate the solutions if True. Default value is True. Can be + set to false if the integral evaluation takes too much time and/or + is not required. + simplify: Boolean + Simplify the solutions for the systems. Default value is True. + Can be set to false if simplification takes too much time and/or + is not required. + + Examples + ======== + + >>> from sympy import symbols, Eq, Function + >>> from sympy.solvers.ode.systems import dsolve_system + >>> f, g = symbols("f g", cls=Function) + >>> x = symbols("x") + + >>> eqs = [Eq(f(x).diff(x), g(x)), Eq(g(x).diff(x), f(x))] + >>> dsolve_system(eqs) + [[Eq(f(x), -C1*exp(-x) + C2*exp(x)), Eq(g(x), C1*exp(-x) + C2*exp(x))]] + + You can also pass the initial conditions for the system of ODEs: + + >>> dsolve_system(eqs, ics={f(0): 1, g(0): 0}) + [[Eq(f(x), exp(x)/2 + exp(-x)/2), Eq(g(x), exp(x)/2 - exp(-x)/2)]] + + Optionally, you can pass the dependent variables and the independent + variable for which the system is to be solved: + + >>> funcs = [f(x), g(x)] + >>> dsolve_system(eqs, funcs=funcs, t=x) + [[Eq(f(x), -C1*exp(-x) + C2*exp(x)), Eq(g(x), C1*exp(-x) + C2*exp(x))]] + + Lets look at an implicit system of ODEs: + + >>> eqs = [Eq(f(x).diff(x)**2, g(x)**2), Eq(g(x).diff(x), g(x))] + >>> dsolve_system(eqs) + [[Eq(f(x), C1 - C2*exp(x)), Eq(g(x), C2*exp(x))], [Eq(f(x), C1 + C2*exp(x)), Eq(g(x), C2*exp(x))]] + + Returns + ======= + + List of List of Equations + + Raises + ====== + + NotImplementedError + When the system of ODEs is not solvable by this function. + ValueError + When the parameters passed are not in the required form. + + """ + from sympy.solvers.ode.ode import solve_ics, _extract_funcs, constant_renumber + + if not iterable(eqs): + raise ValueError(filldedent(''' + List of equations should be passed. The input is not valid. + ''')) + + eqs = _preprocess_eqs(eqs) + + if funcs is not None and not isinstance(funcs, list): + raise ValueError(filldedent(''' + Input to the funcs should be a list of functions. + ''')) + + if funcs is None: + funcs = _extract_funcs(eqs) + + if any(len(func.args) != 1 for func in funcs): + raise ValueError(filldedent(''' + dsolve_system can solve a system of ODEs with only one independent + variable. + ''')) + + if len(eqs) != len(funcs): + raise ValueError(filldedent(''' + Number of equations and number of functions do not match + ''')) + + if t is not None and not isinstance(t, Symbol): + raise ValueError(filldedent(''' + The independent variable must be of type Symbol + ''')) + + if t is None: + t = list(list(eqs[0].atoms(Derivative))[0].atoms(Symbol))[0] + + sols = [] + canon_eqs = canonical_odes(eqs, funcs, t) + + for canon_eq in canon_eqs: + try: + sol = _strong_component_solver(canon_eq, funcs, t) + except NotImplementedError: + sol = None + + if sol is None: + sol = _component_solver(canon_eq, funcs, t) + + sols.append(sol) + + if sols: + final_sols = [] + variables = Tuple(*eqs).free_symbols + + for sol in sols: + + sol = _select_equations(sol, funcs) + sol = constant_renumber(sol, variables=variables) + + if ics: + constants = Tuple(*sol).free_symbols - variables + solved_constants = solve_ics(sol, funcs, constants, ics) + sol = [s.subs(solved_constants) for s in sol] + + if simplify: + constants = Tuple(*sol).free_symbols - variables + sol = simpsol(sol, [t], constants, doit=doit) + + final_sols.append(sol) + + sols = final_sols + + return sols diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_lie_group.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_lie_group.py new file mode 100644 index 0000000000000000000000000000000000000000..153d30ff563773819e49c989f447c1ec7962169b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_lie_group.py @@ -0,0 +1,152 @@ +from sympy.core.function import Function +from sympy.core.numbers import Rational +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (atan, sin, tan) + +from sympy.solvers.ode import (classify_ode, checkinfsol, dsolve, infinitesimals) + +from sympy.solvers.ode.subscheck import checkodesol + +from sympy.testing.pytest import XFAIL + + +C1 = Symbol('C1') +x, y = symbols("x y") +f = Function('f') +xi = Function('xi') +eta = Function('eta') + + +def test_heuristic1(): + a, b, c, a4, a3, a2, a1, a0 = symbols("a b c a4 a3 a2 a1 a0") + df = f(x).diff(x) + eq = Eq(df, x**2*f(x)) + eq1 = f(x).diff(x) + a*f(x) - c*exp(b*x) + eq2 = f(x).diff(x) + 2*x*f(x) - x*exp(-x**2) + eq3 = (1 + 2*x)*df + 2 - 4*exp(-f(x)) + eq4 = f(x).diff(x) - (a4*x**4 + a3*x**3 + a2*x**2 + a1*x + a0)**Rational(-1, 2) + eq5 = x**2*df - f(x) + x**2*exp(x - (1/x)) + eqlist = [eq, eq1, eq2, eq3, eq4, eq5] + + i = infinitesimals(eq, hint='abaco1_simple') + assert i == [{eta(x, f(x)): exp(x**3/3), xi(x, f(x)): 0}, + {eta(x, f(x)): f(x), xi(x, f(x)): 0}, + {eta(x, f(x)): 0, xi(x, f(x)): x**(-2)}] + i1 = infinitesimals(eq1, hint='abaco1_simple') + assert i1 == [{eta(x, f(x)): exp(-a*x), xi(x, f(x)): 0}] + i2 = infinitesimals(eq2, hint='abaco1_simple') + assert i2 == [{eta(x, f(x)): exp(-x**2), xi(x, f(x)): 0}] + i3 = infinitesimals(eq3, hint='abaco1_simple') + assert i3 == [{eta(x, f(x)): 0, xi(x, f(x)): 2*x + 1}, + {eta(x, f(x)): 0, xi(x, f(x)): 1/(exp(f(x)) - 2)}] + i4 = infinitesimals(eq4, hint='abaco1_simple') + assert i4 == [{eta(x, f(x)): 1, xi(x, f(x)): 0}, + {eta(x, f(x)): 0, + xi(x, f(x)): sqrt(a0 + a1*x + a2*x**2 + a3*x**3 + a4*x**4)}] + i5 = infinitesimals(eq5, hint='abaco1_simple') + assert i5 == [{xi(x, f(x)): 0, eta(x, f(x)): exp(-1/x)}] + + ilist = [i, i1, i2, i3, i4, i5] + for eq, i in (zip(eqlist, ilist)): + check = checkinfsol(eq, i) + assert check[0] + + # This ODE can be solved by the Lie Group method, when there are + # better assumptions + eq6 = df - (f(x)/x)*(x*log(x**2/f(x)) + 2) + i = infinitesimals(eq6, hint='abaco1_product') + assert i == [{eta(x, f(x)): f(x)*exp(-x), xi(x, f(x)): 0}] + assert checkinfsol(eq6, i)[0] + + eq7 = x*(f(x).diff(x)) + 1 - f(x)**2 + i = infinitesimals(eq7, hint='chi') + assert checkinfsol(eq7, i)[0] + + +def test_heuristic3(): + a, b = symbols("a b") + df = f(x).diff(x) + + eq = x**2*df + x*f(x) + f(x)**2 + x**2 + i = infinitesimals(eq, hint='bivariate') + assert i == [{eta(x, f(x)): f(x), xi(x, f(x)): x}] + assert checkinfsol(eq, i)[0] + + eq = x**2*(-f(x)**2 + df)- a*x**2*f(x) + 2 - a*x + i = infinitesimals(eq, hint='bivariate') + assert checkinfsol(eq, i)[0] + + +def test_heuristic_function_sum(): + eq = f(x).diff(x) - (3*(1 + x**2/f(x)**2)*atan(f(x)/x) + (1 - 2*f(x))/x + + (1 - 3*f(x))*(x/f(x)**2)) + i = infinitesimals(eq, hint='function_sum') + assert i == [{eta(x, f(x)): f(x)**(-2) + x**(-2), xi(x, f(x)): 0}] + assert checkinfsol(eq, i)[0] + + +def test_heuristic_abaco2_similar(): + a, b = symbols("a b") + F = Function('F') + eq = f(x).diff(x) - F(a*x + b*f(x)) + i = infinitesimals(eq, hint='abaco2_similar') + assert i == [{eta(x, f(x)): -a/b, xi(x, f(x)): 1}] + assert checkinfsol(eq, i)[0] + + eq = f(x).diff(x) - (f(x)**2 / (sin(f(x) - x) - x**2 + 2*x*f(x))) + i = infinitesimals(eq, hint='abaco2_similar') + assert i == [{eta(x, f(x)): f(x)**2, xi(x, f(x)): f(x)**2}] + assert checkinfsol(eq, i)[0] + + +def test_heuristic_abaco2_unique_unknown(): + + a, b = symbols("a b") + F = Function('F') + eq = f(x).diff(x) - x**(a - 1)*(f(x)**(1 - b))*F(x**a/a + f(x)**b/b) + i = infinitesimals(eq, hint='abaco2_unique_unknown') + assert i == [{eta(x, f(x)): -f(x)*f(x)**(-b), xi(x, f(x)): x*x**(-a)}] + assert checkinfsol(eq, i)[0] + + eq = f(x).diff(x) + tan(F(x**2 + f(x)**2) + atan(x/f(x))) + i = infinitesimals(eq, hint='abaco2_unique_unknown') + assert i == [{eta(x, f(x)): x, xi(x, f(x)): -f(x)}] + assert checkinfsol(eq, i)[0] + + eq = (x*f(x).diff(x) + f(x) + 2*x)**2 -4*x*f(x) -4*x**2 -4*a + i = infinitesimals(eq, hint='abaco2_unique_unknown') + assert checkinfsol(eq, i)[0] + + +def test_heuristic_linear(): + a, b, m, n = symbols("a b m n") + + eq = x**(n*(m + 1) - m)*(f(x).diff(x)) - a*f(x)**n -b*x**(n*(m + 1)) + i = infinitesimals(eq, hint='linear') + assert checkinfsol(eq, i)[0] + + +@XFAIL +def test_kamke(): + a, b, alpha, c = symbols("a b alpha c") + eq = x**2*(a*f(x)**2+(f(x).diff(x))) + b*x**alpha + c + i = infinitesimals(eq, hint='sum_function') # XFAIL + assert checkinfsol(eq, i)[0] + + +def test_user_infinitesimals(): + x = Symbol("x") # assuming x is real generates an error + eq = x*(f(x).diff(x)) + 1 - f(x)**2 + sol = Eq(f(x), (C1 + x**2)/(C1 - x**2)) + infinitesimals = {'xi':sqrt(f(x) - 1)/sqrt(f(x) + 1), 'eta':0} + assert dsolve(eq, hint='lie_group', **infinitesimals) == sol + assert checkodesol(eq, sol) == (True, 0) + + +@XFAIL +def test_lie_group_issue15219(): + eqn = exp(f(x).diff(x)-f(x)) + assert 'lie_group' not in classify_ode(eqn, f(x)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_ode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_ode.py new file mode 100644 index 0000000000000000000000000000000000000000..65e0fa62d52445a4669f3cdc5ef278dbf9c88ea4 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_ode.py @@ -0,0 +1,1105 @@ +from sympy.core.function import (Derivative, Function, Subs, diff) +from sympy.core.numbers import (E, I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import acosh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (atan2, cos, sin, tan) +from sympy.integrals.integrals import Integral +from sympy.polys.polytools import Poly +from sympy.series.order import O +from sympy.simplify.radsimp import collect + +from sympy.solvers.ode import (classify_ode, + homogeneous_order, dsolve) + +from sympy.solvers.ode.subscheck import checkodesol +from sympy.solvers.ode.ode import (classify_sysode, + constant_renumber, constantsimp, get_numbered_constants, solve_ics) + +from sympy.solvers.ode.nonhomogeneous import _undetermined_coefficients_match +from sympy.solvers.ode.single import LinearCoefficients +from sympy.solvers.deutils import ode_order +from sympy.testing.pytest import XFAIL, raises, slow, SKIP +from sympy.utilities.misc import filldedent + + +C0, C1, C2, C3, C4, C5, C6, C7, C8, C9, C10 = symbols('C0:11') +u, x, y, z = symbols('u,x:z', real=True) +f = Function('f') +g = Function('g') +h = Function('h') + +# Note: Examples which were specifically testing Single ODE solver are moved to test_single.py +# and all the system of ode examples are moved to test_systems.py +# Note: the tests below may fail (but still be correct) if ODE solver, +# the integral engine, solve(), or even simplify() changes. Also, in +# differently formatted solutions, the arbitrary constants might not be +# equal. Using specific hints in tests can help to avoid this. + +# Tests of order higher than 1 should run the solutions through +# constant_renumber because it will normalize it (constant_renumber causes +# dsolve() to return different results on different machines) + + +def test_get_numbered_constants(): + with raises(ValueError): + get_numbered_constants(None) + + +def test_dsolve_all_hint(): + eq = f(x).diff(x) + output = dsolve(eq, hint='all') + + # Match the Dummy variables: + sol1 = output['separable_Integral'] + _y = sol1.lhs.args[1][0] + sol1 = output['1st_homogeneous_coeff_subs_dep_div_indep_Integral'] + _u1 = sol1.rhs.args[1].args[1][0] + + expected = {'Bernoulli_Integral': Eq(f(x), C1 + Integral(0, x)), + '1st_homogeneous_coeff_best': Eq(f(x), C1), + 'Bernoulli': Eq(f(x), C1), + 'nth_algebraic': Eq(f(x), C1), + 'nth_linear_euler_eq_homogeneous': Eq(f(x), C1), + 'nth_linear_constant_coeff_homogeneous': Eq(f(x), C1), + 'separable': Eq(f(x), C1), + '1st_homogeneous_coeff_subs_indep_div_dep': Eq(f(x), C1), + 'nth_algebraic_Integral': Eq(f(x), C1), + '1st_linear': Eq(f(x), C1), + '1st_linear_Integral': Eq(f(x), C1 + Integral(0, x)), + '1st_exact': Eq(f(x), C1), + '1st_exact_Integral': Eq(Subs(Integral(0, x) + Integral(1, _y), _y, f(x)), C1), + 'lie_group': Eq(f(x), C1), + '1st_homogeneous_coeff_subs_dep_div_indep': Eq(f(x), C1), + '1st_homogeneous_coeff_subs_dep_div_indep_Integral': Eq(log(x), C1 + Integral(-1/_u1, (_u1, f(x)/x))), + '1st_power_series': Eq(f(x), C1), + 'separable_Integral': Eq(Integral(1, (_y, f(x))), C1 + Integral(0, x)), + '1st_homogeneous_coeff_subs_indep_div_dep_Integral': Eq(f(x), C1), + 'best': Eq(f(x), C1), + 'best_hint': 'nth_algebraic', + 'default': 'nth_algebraic', + 'order': 1} + assert output == expected + + assert dsolve(eq, hint='best') == Eq(f(x), C1) + + +def test_dsolve_ics(): + # Maybe this should just use one of the solutions instead of raising... + with raises(NotImplementedError): + dsolve(f(x).diff(x) - sqrt(f(x)), ics={f(1):1}) + + +@slow +def test_dsolve_options(): + eq = x*f(x).diff(x) + f(x) + a = dsolve(eq, hint='all') + b = dsolve(eq, hint='all', simplify=False) + c = dsolve(eq, hint='all_Integral') + keys = ['1st_exact', '1st_exact_Integral', '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_linear', + '1st_linear_Integral', 'Bernoulli', 'Bernoulli_Integral', + 'almost_linear', 'almost_linear_Integral', 'best', 'best_hint', + 'default', 'factorable', 'lie_group', + 'nth_linear_euler_eq_homogeneous', 'order', + 'separable', 'separable_Integral'] + Integral_keys = ['1st_exact_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_linear_Integral', + 'Bernoulli_Integral', 'almost_linear_Integral', 'best', 'best_hint', 'default', + 'factorable', 'nth_linear_euler_eq_homogeneous', + 'order', 'separable_Integral'] + assert sorted(a.keys()) == keys + assert a['order'] == ode_order(eq, f(x)) + assert a['best'] == Eq(f(x), C1/x) + assert dsolve(eq, hint='best') == Eq(f(x), C1/x) + assert a['default'] == 'factorable' + assert a['best_hint'] == 'factorable' + assert not a['1st_exact'].has(Integral) + assert not a['separable'].has(Integral) + assert not a['1st_homogeneous_coeff_best'].has(Integral) + assert not a['1st_homogeneous_coeff_subs_dep_div_indep'].has(Integral) + assert not a['1st_homogeneous_coeff_subs_indep_div_dep'].has(Integral) + assert not a['1st_linear'].has(Integral) + assert a['1st_linear_Integral'].has(Integral) + assert a['1st_exact_Integral'].has(Integral) + assert a['1st_homogeneous_coeff_subs_dep_div_indep_Integral'].has(Integral) + assert a['1st_homogeneous_coeff_subs_indep_div_dep_Integral'].has(Integral) + assert a['separable_Integral'].has(Integral) + assert sorted(b.keys()) == keys + assert b['order'] == ode_order(eq, f(x)) + assert b['best'] == Eq(f(x), C1/x) + assert dsolve(eq, hint='best', simplify=False) == Eq(f(x), C1/x) + assert b['default'] == 'factorable' + assert b['best_hint'] == 'factorable' + assert a['separable'] != b['separable'] + assert a['1st_homogeneous_coeff_subs_dep_div_indep'] != \ + b['1st_homogeneous_coeff_subs_dep_div_indep'] + assert a['1st_homogeneous_coeff_subs_indep_div_dep'] != \ + b['1st_homogeneous_coeff_subs_indep_div_dep'] + assert not b['1st_exact'].has(Integral) + assert not b['separable'].has(Integral) + assert not b['1st_homogeneous_coeff_best'].has(Integral) + assert not b['1st_homogeneous_coeff_subs_dep_div_indep'].has(Integral) + assert not b['1st_homogeneous_coeff_subs_indep_div_dep'].has(Integral) + assert not b['1st_linear'].has(Integral) + assert b['1st_linear_Integral'].has(Integral) + assert b['1st_exact_Integral'].has(Integral) + assert b['1st_homogeneous_coeff_subs_dep_div_indep_Integral'].has(Integral) + assert b['1st_homogeneous_coeff_subs_indep_div_dep_Integral'].has(Integral) + assert b['separable_Integral'].has(Integral) + assert sorted(c.keys()) == Integral_keys + raises(ValueError, lambda: dsolve(eq, hint='notarealhint')) + raises(ValueError, lambda: dsolve(eq, hint='Liouville')) + assert dsolve(f(x).diff(x) - 1/f(x)**2, hint='all')['best'] == \ + dsolve(f(x).diff(x) - 1/f(x)**2, hint='best') + assert dsolve(f(x) + f(x).diff(x) + sin(x).diff(x) + 1, f(x), + hint="1st_linear_Integral") == \ + Eq(f(x), (C1 + Integral((-sin(x).diff(x) - 1)* + exp(Integral(1, x)), x))*exp(-Integral(1, x))) + + +def test_classify_ode(): + assert classify_ode(f(x).diff(x, 2), f(x)) == \ + ( + 'nth_algebraic', + 'nth_linear_constant_coeff_homogeneous', + 'nth_linear_euler_eq_homogeneous', + 'Liouville', + '2nd_power_series_ordinary', + 'nth_algebraic_Integral', + 'Liouville_Integral', + ) + assert classify_ode(f(x), f(x)) == ('nth_algebraic', 'nth_algebraic_Integral') + assert classify_ode(Eq(f(x).diff(x), 0), f(x)) == ( + 'nth_algebraic', + 'separable', + '1st_exact', + '1st_linear', + 'Bernoulli', + '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_power_series', 'lie_group', + 'nth_linear_constant_coeff_homogeneous', + 'nth_linear_euler_eq_homogeneous', + 'nth_algebraic_Integral', + 'separable_Integral', + '1st_exact_Integral', + '1st_linear_Integral', + 'Bernoulli_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral') + assert classify_ode(f(x).diff(x)**2, f(x)) == ('factorable', + 'nth_algebraic', + 'separable', + '1st_exact', + '1st_linear', + 'Bernoulli', + '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_power_series', + 'lie_group', + 'nth_linear_euler_eq_homogeneous', + 'nth_algebraic_Integral', + 'separable_Integral', + '1st_exact_Integral', + '1st_linear_Integral', + 'Bernoulli_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral') + # issue 4749: f(x) should be cleared from highest derivative before classifying + a = classify_ode(Eq(f(x).diff(x) + f(x), x), f(x)) + b = classify_ode(f(x).diff(x)*f(x) + f(x)*f(x) - x*f(x), f(x)) + c = classify_ode(f(x).diff(x)/f(x) + f(x)/f(x) - x/f(x), f(x)) + assert a == ('1st_exact', + '1st_linear', + 'Bernoulli', + 'almost_linear', + '1st_power_series', "lie_group", + 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + '1st_exact_Integral', + '1st_linear_Integral', + 'Bernoulli_Integral', + 'almost_linear_Integral', + 'nth_linear_constant_coeff_variation_of_parameters_Integral') + assert b == ('factorable', + '1st_linear', + 'Bernoulli', + '1st_power_series', + 'lie_group', + 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + '1st_linear_Integral', + 'Bernoulli_Integral', + 'nth_linear_constant_coeff_variation_of_parameters_Integral') + assert c == ('factorable', + '1st_linear', + 'Bernoulli', + '1st_power_series', + 'lie_group', + 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + '1st_linear_Integral', + 'Bernoulli_Integral', + 'nth_linear_constant_coeff_variation_of_parameters_Integral') + + assert classify_ode( + 2*x*f(x)*f(x).diff(x) + (1 + x)*f(x)**2 - exp(x), f(x) + ) == ('factorable', '1st_exact', 'Bernoulli', 'almost_linear', 'lie_group', + '1st_exact_Integral', 'Bernoulli_Integral', 'almost_linear_Integral') + assert 'Riccati_special_minus2' in \ + classify_ode(2*f(x).diff(x) + f(x)**2 - f(x)/x + 3*x**(-2), f(x)) + raises(ValueError, lambda: classify_ode(x + f(x, y).diff(x).diff( + y), f(x, y))) + # issue 5176 + k = Symbol('k') + assert classify_ode(f(x).diff(x)/(k*f(x) + k*x*f(x)) + 2*f(x)/(k*f(x) + + k*x*f(x)) + x*f(x).diff(x)/(k*f(x) + k*x*f(x)) + z, f(x)) == \ + ('factorable', 'separable', '1st_exact', '1st_linear', 'Bernoulli', + '1st_power_series', 'lie_group', 'separable_Integral', '1st_exact_Integral', + '1st_linear_Integral', 'Bernoulli_Integral') + # preprocessing + ans = ('factorable', 'nth_algebraic', 'separable', '1st_exact', '1st_linear', 'Bernoulli', + '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_power_series', 'lie_group', + 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + 'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters', + 'nth_algebraic_Integral', + 'separable_Integral', '1st_exact_Integral', + '1st_linear_Integral', + 'Bernoulli_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral', + 'nth_linear_constant_coeff_variation_of_parameters_Integral', + 'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral') + # w/o f(x) given + assert classify_ode(diff(f(x) + x, x) + diff(f(x), x)) == ans + # w/ f(x) and prep=True + assert classify_ode(diff(f(x) + x, x) + diff(f(x), x), f(x), + prep=True) == ans + + assert classify_ode(Eq(2*x**3*f(x).diff(x), 0), f(x)) == \ + ('factorable', 'nth_algebraic', 'separable', '1st_exact', + '1st_linear', 'Bernoulli', '1st_power_series', + 'lie_group', 'nth_linear_euler_eq_homogeneous', + 'nth_algebraic_Integral', 'separable_Integral', '1st_exact_Integral', + '1st_linear_Integral', 'Bernoulli_Integral') + + + assert classify_ode(Eq(2*f(x)**3*f(x).diff(x), 0), f(x)) == \ + ('factorable', 'nth_algebraic', 'separable', '1st_exact', '1st_linear', + 'Bernoulli', '1st_power_series', 'lie_group', 'nth_algebraic_Integral', + 'separable_Integral', '1st_exact_Integral', '1st_linear_Integral', + 'Bernoulli_Integral') + # test issue 13864 + assert classify_ode(Eq(diff(f(x), x) - f(x)**x, 0), f(x)) == \ + ('1st_power_series', 'lie_group') + assert isinstance(classify_ode(Eq(f(x), 5), f(x), dict=True), dict) + + #This is for new behavior of classify_ode when called internally with default, It should + # return the first hint which matches therefore, 'ordered_hints' key will not be there. + assert sorted(classify_ode(Eq(f(x).diff(x), 0), f(x), dict=True).keys()) == \ + ['default', 'nth_linear_constant_coeff_homogeneous', 'order'] + a = classify_ode(2*x*f(x)*f(x).diff(x) + (1 + x)*f(x)**2 - exp(x), f(x), dict=True, hint='Bernoulli') + assert sorted(a.keys()) == ['Bernoulli', 'Bernoulli_Integral', 'default', 'order', 'ordered_hints'] + + # test issue 22155 + a = classify_ode(f(x).diff(x) - exp(f(x) - x), f(x)) + assert a == ('separable', + '1st_exact', '1st_power_series', + 'lie_group', 'separable_Integral', + '1st_exact_Integral') + + +def test_classify_ode_ics(): + # Dummy + eq = f(x).diff(x, x) - f(x) + + # Not f(0) or f'(0) + ics = {x: 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + + ############################ + # f(0) type (AppliedUndef) # + ############################ + + + # Wrong function + ics = {g(0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Contains x + ics = {f(x): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Too many args + ics = {f(0, 0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # point contains x + ics = {f(0): f(x)} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Does not raise + ics = {f(0): f(0)} + classify_ode(eq, f(x), ics=ics) + + # Does not raise + ics = {f(0): 1} + classify_ode(eq, f(x), ics=ics) + + + ##################### + # f'(0) type (Subs) # + ##################### + + # Wrong function + ics = {g(x).diff(x).subs(x, 0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Contains x + ics = {f(y).diff(y).subs(y, x): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Wrong variable + ics = {f(y).diff(y).subs(y, 0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Too many args + ics = {f(x, y).diff(x).subs(x, 0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Derivative wrt wrong vars + ics = {Derivative(f(x), x, y).subs(x, 0): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # point contains x + ics = {f(x).diff(x).subs(x, 0): f(x)} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Does not raise + ics = {f(x).diff(x).subs(x, 0): f(x).diff(x).subs(x, 0)} + classify_ode(eq, f(x), ics=ics) + + # Does not raise + ics = {f(x).diff(x).subs(x, 0): 1} + classify_ode(eq, f(x), ics=ics) + + ########################### + # f'(y) type (Derivative) # + ########################### + + # Wrong function + ics = {g(x).diff(x).subs(x, y): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Contains x + ics = {f(y).diff(y).subs(y, x): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Too many args + ics = {f(x, y).diff(x).subs(x, y): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Derivative wrt wrong vars + ics = {Derivative(f(x), x, z).subs(x, y): 1} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # point contains x + ics = {f(x).diff(x).subs(x, y): f(x)} + raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics)) + + # Does not raise + ics = {f(x).diff(x).subs(x, 0): f(0)} + classify_ode(eq, f(x), ics=ics) + + # Does not raise + ics = {f(x).diff(x).subs(x, y): 1} + classify_ode(eq, f(x), ics=ics) + +def test_classify_sysode(): + # Here x is assumed to be x(t) and y as y(t) for simplicity. + # Similarly diff(x,t) and diff(y,y) is assumed to be x1 and y1 respectively. + k, l, m, n = symbols('k, l, m, n', Integer=True) + k1, k2, k3, l1, l2, l3, m1, m2, m3 = symbols('k1, k2, k3, l1, l2, l3, m1, m2, m3', Integer=True) + P, Q, R, p, q, r = symbols('P, Q, R, p, q, r', cls=Function) + P1, P2, P3, Q1, Q2, R1, R2 = symbols('P1, P2, P3, Q1, Q2, R1, R2', cls=Function) + x, y, z = symbols('x, y, z', cls=Function) + t = symbols('t') + x1 = diff(x(t),t) + y1 = diff(y(t),t) + + eq6 = (Eq(x1, exp(k*x(t))*P(x(t),y(t))), Eq(y1,r(y(t))*P(x(t),y(t)))) + sol6 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): 0, (1, x(t), 1): 0, (0, x(t), 1): 1, (1, y(t), 0): 0, \ + (1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): 0, (1, y(t), 1): 1}, 'type_of_equation': 'type2', 'func': \ + [x(t), y(t)], 'is_linear': False, 'eq': [-P(x(t), y(t))*exp(k*x(t)) + Derivative(x(t), t), -P(x(t), \ + y(t))*r(y(t)) + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}} + assert classify_sysode(eq6) == sol6 + + eq7 = (Eq(x1, x(t)**2+y(t)/x(t)), Eq(y1, x(t)/y(t))) + sol7 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): 0, (1, x(t), 1): 0, (0, x(t), 1): 1, (1, y(t), 0): 0, \ + (1, x(t), 0): -1/y(t), (0, y(t), 1): 0, (0, y(t), 0): -1/x(t), (1, y(t), 1): 1}, 'type_of_equation': 'type3', \ + 'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)**2 + Derivative(x(t), t) - y(t)/x(t), -x(t)/y(t) + \ + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}} + assert classify_sysode(eq7) == sol7 + + eq8 = (Eq(x1, P1(x(t))*Q1(y(t))*R(x(t),y(t),t)), Eq(y1, P1(x(t))*Q1(y(t))*R(x(t),y(t),t))) + sol8 = {'func': [x(t), y(t)], 'is_linear': False, 'type_of_equation': 'type4', 'eq': \ + [-P1(x(t))*Q1(y(t))*R(x(t), y(t), t) + Derivative(x(t), t), -P1(x(t))*Q1(y(t))*R(x(t), y(t), t) + \ + Derivative(y(t), t)], 'func_coeff': {(0, y(t), 1): 0, (1, y(t), 1): 1, (1, x(t), 1): 0, (0, y(t), 0): 0, \ + (1, x(t), 0): 0, (0, x(t), 0): 0, (1, y(t), 0): 0, (0, x(t), 1): 1}, 'order': {y(t): 1, x(t): 1}, 'no_of_equation': 2} + assert classify_sysode(eq8) == sol8 + + eq11 = (Eq(x1,x(t)*y(t)**3), Eq(y1,y(t)**5)) + sol11 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): -y(t)**3, (1, x(t), 1): 0, (0, x(t), 1): 1, \ + (1, y(t), 0): 0, (1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): 0, (1, y(t), 1): 1}, 'type_of_equation': \ + 'type1', 'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)*y(t)**3 + Derivative(x(t), t), \ + -y(t)**5 + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}} + assert classify_sysode(eq11) == sol11 + + eq13 = (Eq(x1,x(t)*y(t)*sin(t)**2), Eq(y1,y(t)**2*sin(t)**2)) + sol13 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): -y(t)*sin(t)**2, (1, x(t), 1): 0, (0, x(t), 1): 1, \ + (1, y(t), 0): 0, (1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): -x(t)*sin(t)**2, (1, y(t), 1): 1}, \ + 'type_of_equation': 'type4', 'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)*y(t)*sin(t)**2 + \ + Derivative(x(t), t), -y(t)**2*sin(t)**2 + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}} + assert classify_sysode(eq13) == sol13 + + +def test_solve_ics(): + # Basic tests that things work from dsolve. + assert dsolve(f(x).diff(x) - 1/f(x), f(x), ics={f(1): 2}) == \ + Eq(f(x), sqrt(2 * x + 2)) + assert dsolve(f(x).diff(x) - f(x), f(x), ics={f(0): 1}) == Eq(f(x), exp(x)) + assert dsolve(f(x).diff(x) - f(x), f(x), ics={f(x).diff(x).subs(x, 0): 1}) == Eq(f(x), exp(x)) + assert dsolve(f(x).diff(x, x) + f(x), f(x), ics={f(0): 1, + f(x).diff(x).subs(x, 0): 1}) == Eq(f(x), sin(x) + cos(x)) + assert dsolve([f(x).diff(x) - f(x) + g(x), g(x).diff(x) - g(x) - f(x)], + [f(x), g(x)], ics={f(0): 1, g(0): 0}) == [Eq(f(x), exp(x)*cos(x)), Eq(g(x), exp(x)*sin(x))] + + # Test cases where dsolve returns two solutions. + eq = (x**2*f(x)**2 - x).diff(x) + assert dsolve(eq, f(x), ics={f(1): 0}) == [Eq(f(x), + -sqrt(x - 1)/x), Eq(f(x), sqrt(x - 1)/x)] + assert dsolve(eq, f(x), ics={f(x).diff(x).subs(x, 1): 0}) == [Eq(f(x), + -sqrt(x - S.Half)/x), Eq(f(x), sqrt(x - S.Half)/x)] + + eq = cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x) + assert dsolve(eq, f(x), + ics={f(0):1}, hint='1st_exact', simplify=False) == Eq(x*cos(f(x)) + f(x)**3/3, Rational(1, 3)) + assert dsolve(eq, f(x), + ics={f(0):1}, hint='1st_exact', simplify=True) == Eq(x*cos(f(x)) + f(x)**3/3, Rational(1, 3)) + + assert solve_ics([Eq(f(x), C1*exp(x))], [f(x)], [C1], {f(0): 1}) == {C1: 1} + assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], + {f(0): 1, f(pi/2): 1}) == {C1: 1, C2: 1} + + assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], + {f(0): 1, f(x).diff(x).subs(x, 0): 1}) == {C1: 1, C2: 1} + + assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], {f(0): 1}) == \ + {C2: 1} + + # Some more complicated tests Refer to PR #16098 + + assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0, f(x).diff(x).subs(x, 1):0})) == \ + {Eq(f(x), 0), Eq(f(x), x ** 3 / 6 - x / 2)} + assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0})) == \ + {Eq(f(x), 0), Eq(f(x), C2*x + x**3/6)} + + K, r, f0 = symbols('K r f0') + sol = Eq(f(x), K*f0*exp(r*x)/((-K + f0)*(f0*exp(r*x)/(-K + f0) - 1))) + assert (dsolve(Eq(f(x).diff(x), r * f(x) * (1 - f(x) / K)), f(x), ics={f(0): f0})) == sol + + + #Order dependent issues Refer to PR #16098 + assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(x).diff(x).subs(x,0):0, f(0):0})) == \ + {Eq(f(x), 0), Eq(f(x), x ** 3 / 6)} + assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0, f(x).diff(x).subs(x,0):0})) == \ + {Eq(f(x), 0), Eq(f(x), x ** 3 / 6)} + + # XXX: Ought to be ValueError + raises(ValueError, lambda: solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], {f(0): 1, f(pi): 1})) + + # Degenerate case. f'(0) is identically 0. + raises(ValueError, lambda: solve_ics([Eq(f(x), sqrt(C1 - x**2))], [f(x)], [C1], {f(x).diff(x).subs(x, 0): 0})) + + EI, q, L = symbols('EI q L') + + # eq = Eq(EI*diff(f(x), x, 4), q) + sols = [Eq(f(x), C1 + C2*x + C3*x**2 + C4*x**3 + q*x**4/(24*EI))] + funcs = [f(x)] + constants = [C1, C2, C3, C4] + # Test both cases, Derivative (the default from f(x).diff(x).subs(x, L)), + # and Subs + ics1 = {f(0): 0, + f(x).diff(x).subs(x, 0): 0, + f(L).diff(L, 2): 0, + f(L).diff(L, 3): 0} + ics2 = {f(0): 0, + f(x).diff(x).subs(x, 0): 0, + Subs(f(x).diff(x, 2), x, L): 0, + Subs(f(x).diff(x, 3), x, L): 0} + + solved_constants1 = solve_ics(sols, funcs, constants, ics1) + solved_constants2 = solve_ics(sols, funcs, constants, ics2) + assert solved_constants1 == solved_constants2 == { + C1: 0, + C2: 0, + C3: L**2*q/(4*EI), + C4: -L*q/(6*EI)} + + # Allow the ics to refer to f + ics = {f(0): f(0)} + assert dsolve(f(x).diff(x) - f(x), f(x), ics=ics) == Eq(f(x), f(0)*exp(x)) + + ics = {f(x).diff(x).subs(x, 0): f(x).diff(x).subs(x, 0), f(0): f(0)} + assert dsolve(f(x).diff(x, x) + f(x), f(x), ics=ics) == \ + Eq(f(x), f(0)*cos(x) + f(x).diff(x).subs(x, 0)*sin(x)) + +def test_ode_order(): + f = Function('f') + g = Function('g') + x = Symbol('x') + assert ode_order(3*x*exp(f(x)), f(x)) == 0 + assert ode_order(x*diff(f(x), x) + 3*x*f(x) - sin(x)/x, f(x)) == 1 + assert ode_order(x**2*f(x).diff(x, x) + x*diff(f(x), x) - f(x), f(x)) == 2 + assert ode_order(diff(x*exp(f(x)), x, x), f(x)) == 2 + assert ode_order(diff(x*diff(x*exp(f(x)), x, x), x), f(x)) == 3 + assert ode_order(diff(f(x), x, x), g(x)) == 0 + assert ode_order(diff(f(x), x, x)*diff(g(x), x), f(x)) == 2 + assert ode_order(diff(f(x), x, x)*diff(g(x), x), g(x)) == 1 + assert ode_order(diff(x*diff(x*exp(f(x)), x, x), x), g(x)) == 0 + # issue 5835: ode_order has to also work for unevaluated derivatives + # (ie, without using doit()). + assert ode_order(Derivative(x*f(x), x), f(x)) == 1 + assert ode_order(x*sin(Derivative(x*f(x)**2, x, x)), f(x)) == 2 + assert ode_order(Derivative(x*Derivative(x*exp(f(x)), x, x), x), g(x)) == 0 + assert ode_order(Derivative(f(x), x, x), g(x)) == 0 + assert ode_order(Derivative(x*exp(f(x)), x, x), f(x)) == 2 + assert ode_order(Derivative(f(x), x, x)*Derivative(g(x), x), g(x)) == 1 + assert ode_order(Derivative(x*Derivative(f(x), x, x), x), f(x)) == 3 + assert ode_order( + x*sin(Derivative(x*Derivative(f(x), x)**2, x, x)), f(x)) == 3 + + +def test_homogeneous_order(): + assert homogeneous_order(exp(y/x) + tan(y/x), x, y) == 0 + assert homogeneous_order(x**2 + sin(x)*cos(y), x, y) is None + assert homogeneous_order(x - y - x*sin(y/x), x, y) == 1 + assert homogeneous_order((x*y + sqrt(x**4 + y**4) + x**2*(log(x) - log(y)))/ + (pi*x**Rational(2, 3)*sqrt(y)**3), x, y) == Rational(-1, 6) + assert homogeneous_order(y/x*cos(y/x) - x/y*sin(y/x) + cos(y/x), x, y) == 0 + assert homogeneous_order(f(x), x, f(x)) == 1 + assert homogeneous_order(f(x)**2, x, f(x)) == 2 + assert homogeneous_order(x*y*z, x, y) == 2 + assert homogeneous_order(x*y*z, x, y, z) == 3 + assert homogeneous_order(x**2*f(x)/sqrt(x**2 + f(x)**2), f(x)) is None + assert homogeneous_order(f(x, y)**2, x, f(x, y), y) == 2 + assert homogeneous_order(f(x, y)**2, x, f(x), y) is None + assert homogeneous_order(f(x, y)**2, x, f(x, y)) is None + assert homogeneous_order(f(y, x)**2, x, y, f(x, y)) is None + assert homogeneous_order(f(y), f(x), x) is None + assert homogeneous_order(-f(x)/x + 1/sin(f(x)/ x), f(x), x) == 0 + assert homogeneous_order(log(1/y) + log(x**2), x, y) is None + assert homogeneous_order(log(1/y) + log(x), x, y) == 0 + assert homogeneous_order(log(x/y), x, y) == 0 + assert homogeneous_order(2*log(1/y) + 2*log(x), x, y) == 0 + a = Symbol('a') + assert homogeneous_order(a*log(1/y) + a*log(x), x, y) == 0 + assert homogeneous_order(f(x).diff(x), x, y) is None + assert homogeneous_order(-f(x).diff(x) + x, x, y) is None + assert homogeneous_order(O(x), x, y) is None + assert homogeneous_order(x + O(x**2), x, y) is None + assert homogeneous_order(x**pi, x) == pi + assert homogeneous_order(x**x, x) is None + raises(ValueError, lambda: homogeneous_order(x*y)) + + +@XFAIL +def test_noncircularized_real_imaginary_parts(): + # If this passes, lines numbered 3878-3882 (at the time of this commit) + # of sympy/solvers/ode.py for nth_linear_constant_coeff_homogeneous + # should be removed. + y = sqrt(1+x) + i, r = im(y), re(y) + assert not (i.has(atan2) and r.has(atan2)) + + +def test_collect_respecting_exponentials(): + # If this test passes, lines 1306-1311 (at the time of this commit) + # of sympy/solvers/ode.py should be removed. + sol = 1 + exp(x/2) + assert sol == collect( sol, exp(x/3)) + + +def test_undetermined_coefficients_match(): + assert _undetermined_coefficients_match(g(x), x) == {'test': False} + assert _undetermined_coefficients_match(sin(2*x + sqrt(5)), x) == \ + {'test': True, 'trialset': + {cos(2*x + sqrt(5)), sin(2*x + sqrt(5))}} + assert _undetermined_coefficients_match(sin(x)*cos(x), x) == \ + {'test': False} + s = {cos(x), x*cos(x), x**2*cos(x), x**2*sin(x), x*sin(x), sin(x)} + assert _undetermined_coefficients_match(sin(x)*(x**2 + x + 1), x) == \ + {'test': True, 'trialset': s} + assert _undetermined_coefficients_match( + sin(x)*x**2 + sin(x)*x + sin(x), x) == {'test': True, 'trialset': s} + assert _undetermined_coefficients_match( + exp(2*x)*sin(x)*(x**2 + x + 1), x + ) == { + 'test': True, 'trialset': {exp(2*x)*sin(x), x**2*exp(2*x)*sin(x), + cos(x)*exp(2*x), x**2*cos(x)*exp(2*x), x*cos(x)*exp(2*x), + x*exp(2*x)*sin(x)}} + assert _undetermined_coefficients_match(1/sin(x), x) == {'test': False} + assert _undetermined_coefficients_match(log(x), x) == {'test': False} + assert _undetermined_coefficients_match(2**(x)*(x**2 + x + 1), x) == \ + {'test': True, 'trialset': {2**x, x*2**x, x**2*2**x}} + assert _undetermined_coefficients_match(x**y, x) == {'test': False} + assert _undetermined_coefficients_match(exp(x)*exp(2*x + 1), x) == \ + {'test': True, 'trialset': {exp(1 + 3*x)}} + assert _undetermined_coefficients_match(sin(x)*(x**2 + x + 1), x) == \ + {'test': True, 'trialset': {x*cos(x), x*sin(x), x**2*cos(x), + x**2*sin(x), cos(x), sin(x)}} + assert _undetermined_coefficients_match(sin(x)*(x + sin(x)), x) == \ + {'test': False} + assert _undetermined_coefficients_match(sin(x)*(x + sin(2*x)), x) == \ + {'test': False} + assert _undetermined_coefficients_match(sin(x)*tan(x), x) == \ + {'test': False} + assert _undetermined_coefficients_match( + x**2*sin(x)*exp(x) + x*sin(x) + x, x + ) == { + 'test': True, 'trialset': {x**2*cos(x)*exp(x), x, cos(x), S.One, + exp(x)*sin(x), sin(x), x*exp(x)*sin(x), x*cos(x), x*cos(x)*exp(x), + x*sin(x), cos(x)*exp(x), x**2*exp(x)*sin(x)}} + assert _undetermined_coefficients_match(4*x*sin(x - 2), x) == { + 'trialset': {x*cos(x - 2), x*sin(x - 2), cos(x - 2), sin(x - 2)}, + 'test': True, + } + assert _undetermined_coefficients_match(2**x*x, x) == \ + {'test': True, 'trialset': {2**x, x*2**x}} + assert _undetermined_coefficients_match(2**x*exp(2*x), x) == \ + {'test': True, 'trialset': {2**x*exp(2*x)}} + assert _undetermined_coefficients_match(exp(-x)/x, x) == \ + {'test': False} + # Below are from Ordinary Differential Equations, + # Tenenbaum and Pollard, pg. 231 + assert _undetermined_coefficients_match(S(4), x) == \ + {'test': True, 'trialset': {S.One}} + assert _undetermined_coefficients_match(12*exp(x), x) == \ + {'test': True, 'trialset': {exp(x)}} + assert _undetermined_coefficients_match(exp(I*x), x) == \ + {'test': True, 'trialset': {exp(I*x)}} + assert _undetermined_coefficients_match(sin(x), x) == \ + {'test': True, 'trialset': {cos(x), sin(x)}} + assert _undetermined_coefficients_match(cos(x), x) == \ + {'test': True, 'trialset': {cos(x), sin(x)}} + assert _undetermined_coefficients_match(8 + 6*exp(x) + 2*sin(x), x) == \ + {'test': True, 'trialset': {S.One, cos(x), sin(x), exp(x)}} + assert _undetermined_coefficients_match(x**2, x) == \ + {'test': True, 'trialset': {S.One, x, x**2}} + assert _undetermined_coefficients_match(9*x*exp(x) + exp(-x), x) == \ + {'test': True, 'trialset': {x*exp(x), exp(x), exp(-x)}} + assert _undetermined_coefficients_match(2*exp(2*x)*sin(x), x) == \ + {'test': True, 'trialset': {exp(2*x)*sin(x), cos(x)*exp(2*x)}} + assert _undetermined_coefficients_match(x - sin(x), x) == \ + {'test': True, 'trialset': {S.One, x, cos(x), sin(x)}} + assert _undetermined_coefficients_match(x**2 + 2*x, x) == \ + {'test': True, 'trialset': {S.One, x, x**2}} + assert _undetermined_coefficients_match(4*x*sin(x), x) == \ + {'test': True, 'trialset': {x*cos(x), x*sin(x), cos(x), sin(x)}} + assert _undetermined_coefficients_match(x*sin(2*x), x) == \ + {'test': True, 'trialset': + {x*cos(2*x), x*sin(2*x), cos(2*x), sin(2*x)}} + assert _undetermined_coefficients_match(x**2*exp(-x), x) == \ + {'test': True, 'trialset': {x*exp(-x), x**2*exp(-x), exp(-x)}} + assert _undetermined_coefficients_match(2*exp(-x) - x**2*exp(-x), x) == \ + {'test': True, 'trialset': {x*exp(-x), x**2*exp(-x), exp(-x)}} + assert _undetermined_coefficients_match(exp(-2*x) + x**2, x) == \ + {'test': True, 'trialset': {S.One, x, x**2, exp(-2*x)}} + assert _undetermined_coefficients_match(x*exp(-x), x) == \ + {'test': True, 'trialset': {x*exp(-x), exp(-x)}} + assert _undetermined_coefficients_match(x + exp(2*x), x) == \ + {'test': True, 'trialset': {S.One, x, exp(2*x)}} + assert _undetermined_coefficients_match(sin(x) + exp(-x), x) == \ + {'test': True, 'trialset': {cos(x), sin(x), exp(-x)}} + assert _undetermined_coefficients_match(exp(x), x) == \ + {'test': True, 'trialset': {exp(x)}} + # converted from sin(x)**2 + assert _undetermined_coefficients_match(S.Half - cos(2*x)/2, x) == \ + {'test': True, 'trialset': {S.One, cos(2*x), sin(2*x)}} + # converted from exp(2*x)*sin(x)**2 + assert _undetermined_coefficients_match( + exp(2*x)*(S.Half + cos(2*x)/2), x + ) == { + 'test': True, 'trialset': {exp(2*x)*sin(2*x), cos(2*x)*exp(2*x), + exp(2*x)}} + assert _undetermined_coefficients_match(2*x + sin(x) + cos(x), x) == \ + {'test': True, 'trialset': {S.One, x, cos(x), sin(x)}} + # converted from sin(2*x)*sin(x) + assert _undetermined_coefficients_match(cos(x)/2 - cos(3*x)/2, x) == \ + {'test': True, 'trialset': {cos(x), cos(3*x), sin(x), sin(3*x)}} + assert _undetermined_coefficients_match(cos(x**2), x) == {'test': False} + assert _undetermined_coefficients_match(2**(x**2), x) == {'test': False} + + +def test_issue_4785_22462(): + from sympy.abc import A + eq = x + A*(x + diff(f(x), x) + f(x)) + diff(f(x), x) + f(x) + 2 + assert classify_ode(eq, f(x)) == ('factorable', '1st_exact', '1st_linear', + 'Bernoulli', 'almost_linear', '1st_power_series', 'lie_group', + 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + '1st_exact_Integral', '1st_linear_Integral', 'Bernoulli_Integral', + 'almost_linear_Integral', + 'nth_linear_constant_coeff_variation_of_parameters_Integral') + # issue 4864 + eq = (x**2 + f(x)**2)*f(x).diff(x) - 2*x*f(x) + assert classify_ode(eq, f(x)) == ('factorable', '1st_exact', + '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', + '1st_homogeneous_coeff_subs_dep_div_indep', + '1st_power_series', + 'lie_group', '1st_exact_Integral', + '1st_homogeneous_coeff_subs_indep_div_dep_Integral', + '1st_homogeneous_coeff_subs_dep_div_indep_Integral') + + +def test_issue_4825(): + raises(ValueError, lambda: dsolve(f(x, y).diff(x) - y*f(x, y), f(x))) + assert classify_ode(f(x, y).diff(x) - y*f(x, y), f(x), dict=True) == \ + {'order': 0, 'default': None, 'ordered_hints': ()} + # See also issue 3793, test Z13. + raises(ValueError, lambda: dsolve(f(x).diff(x), f(y))) + assert classify_ode(f(x).diff(x), f(y), dict=True) == \ + {'order': 0, 'default': None, 'ordered_hints': ()} + + +def test_constant_renumber_order_issue_5308(): + from sympy.utilities.iterables import variations + + assert constant_renumber(C1*x + C2*y) == \ + constant_renumber(C1*y + C2*x) == \ + C1*x + C2*y + e = C1*(C2 + x)*(C3 + y) + for a, b, c in variations([C1, C2, C3], 3): + assert constant_renumber(a*(b + x)*(c + y)) == e + + +def test_constant_renumber(): + e1, e2, x, y = symbols("e1:3 x y") + exprs = [e2*x, e1*x + e2*y] + + assert constant_renumber(exprs[0]) == e2*x + assert constant_renumber(exprs[0], variables=[x]) == C1*x + assert constant_renumber(exprs[0], variables=[x], newconstants=[C2]) == C2*x + assert constant_renumber(exprs, variables=[x, y]) == [C1*x, C1*y + C2*x] + assert constant_renumber(exprs, variables=[x, y], newconstants=symbols("C3:5")) == [C3*x, C3*y + C4*x] + + +def test_issue_5770(): + k = Symbol("k", real=True) + t = Symbol('t') + w = Function('w') + sol = dsolve(w(t).diff(t, 6) - k**6*w(t), w(t)) + assert len([s for s in sol.free_symbols if s.name.startswith('C')]) == 6 + assert constantsimp((C1*cos(x) + C2*cos(x))*exp(x), {C1, C2}) == \ + C1*cos(x)*exp(x) + assert constantsimp(C1*cos(x) + C2*cos(x) + C3*sin(x), {C1, C2, C3}) == \ + C1*cos(x) + C3*sin(x) + assert constantsimp(exp(C1 + x), {C1}) == C1*exp(x) + assert constantsimp(x + C1 + y, {C1, y}) == C1 + x + assert constantsimp(x + C1 + Integral(x, (x, 1, 2)), {C1}) == C1 + x + + +def test_issue_5112_5430(): + assert homogeneous_order(-log(x) + acosh(x), x) is None + assert homogeneous_order(y - log(x), x, y) is None + + +def test_issue_5095(): + f = Function('f') + raises(ValueError, lambda: dsolve(f(x).diff(x)**2, f(x), 'fdsjf')) + + +def test_homogeneous_function(): + f = Function('f') + eq1 = tan(x + f(x)) + eq2 = sin((3*x)/(4*f(x))) + eq3 = cos(x*f(x)*Rational(3, 4)) + eq4 = log((3*x + 4*f(x))/(5*f(x) + 7*x)) + eq5 = exp((2*x**2)/(3*f(x)**2)) + eq6 = log((3*x + 4*f(x))/(5*f(x) + 7*x) + exp((2*x**2)/(3*f(x)**2))) + eq7 = sin((3*x)/(5*f(x) + x**2)) + assert homogeneous_order(eq1, x, f(x)) == None + assert homogeneous_order(eq2, x, f(x)) == 0 + assert homogeneous_order(eq3, x, f(x)) == None + assert homogeneous_order(eq4, x, f(x)) == 0 + assert homogeneous_order(eq5, x, f(x)) == 0 + assert homogeneous_order(eq6, x, f(x)) == 0 + assert homogeneous_order(eq7, x, f(x)) == None + + +def test_linear_coeff_match(): + n, d = z*(2*x + 3*f(x) + 5), z*(7*x + 9*f(x) + 11) + rat = n/d + eq1 = sin(rat) + cos(rat.expand()) + obj1 = LinearCoefficients(eq1) + eq2 = rat + obj2 = LinearCoefficients(eq2) + eq3 = log(sin(rat)) + obj3 = LinearCoefficients(eq3) + ans = (4, Rational(-13, 3)) + assert obj1._linear_coeff_match(eq1, f(x)) == ans + assert obj2._linear_coeff_match(eq2, f(x)) == ans + assert obj3._linear_coeff_match(eq3, f(x)) == ans + + # no c + eq4 = (3*x)/f(x) + obj4 = LinearCoefficients(eq4) + # not x and f(x) + eq5 = (3*x + 2)/x + obj5 = LinearCoefficients(eq5) + # denom will be zero + eq6 = (3*x + 2*f(x) + 1)/(3*x + 2*f(x) + 5) + obj6 = LinearCoefficients(eq6) + # not rational coefficient + eq7 = (3*x + 2*f(x) + sqrt(2))/(3*x + 2*f(x) + 5) + obj7 = LinearCoefficients(eq7) + assert obj4._linear_coeff_match(eq4, f(x)) is None + assert obj5._linear_coeff_match(eq5, f(x)) is None + assert obj6._linear_coeff_match(eq6, f(x)) is None + assert obj7._linear_coeff_match(eq7, f(x)) is None + + +def test_constantsimp_take_problem(): + c = exp(C1) + 2 + assert len(Poly(constantsimp(exp(C1) + c + c*x, [C1])).gens) == 2 + + +def test_series(): + C1 = Symbol("C1") + eq = f(x).diff(x) - f(x) + sol = Eq(f(x), C1 + C1*x + C1*x**2/2 + C1*x**3/6 + C1*x**4/24 + + C1*x**5/120 + O(x**6)) + assert dsolve(eq, hint='1st_power_series') == sol + assert checkodesol(eq, sol, order=1)[0] + + eq = f(x).diff(x) - x*f(x) + sol = Eq(f(x), C1*x**4/8 + C1*x**2/2 + C1 + O(x**6)) + assert dsolve(eq, hint='1st_power_series') == sol + assert checkodesol(eq, sol, order=1)[0] + + eq = f(x).diff(x) - sin(x*f(x)) + sol = Eq(f(x), (x - 2)**2*(1+ sin(4))*cos(4) + (x - 2)*sin(4) + 2 + O(x**3)) + assert dsolve(eq, hint='1st_power_series', ics={f(2): 2}, n=3) == sol + # FIXME: The solution here should be O((x-2)**3) so is incorrect + #assert checkodesol(eq, sol, order=1)[0] + + +@slow +def test_2nd_power_series_ordinary(): + C1, C2 = symbols("C1 C2") + + eq = f(x).diff(x, 2) - x*f(x) + assert classify_ode(eq) == ('2nd_linear_airy', '2nd_power_series_ordinary') + sol = Eq(f(x), C2*(x**3/6 + 1) + C1*x*(x**3/12 + 1) + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_ordinary') == sol + assert checkodesol(eq, sol) == (True, 0) + + sol = Eq(f(x), C2*((x + 2)**4/6 + (x + 2)**3/6 - (x + 2)**2 + 1) + + C1*(x + (x + 2)**4/12 - (x + 2)**3/3 + S(2)) + + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_ordinary', x0=-2) == sol + # FIXME: Solution should be O((x+2)**6) + # assert checkodesol(eq, sol) == (True, 0) + + sol = Eq(f(x), C2*x + C1 + O(x**2)) + assert dsolve(eq, hint='2nd_power_series_ordinary', n=2) == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = (1 + x**2)*(f(x).diff(x, 2)) + 2*x*(f(x).diff(x)) -2*f(x) + assert classify_ode(eq) == ('factorable', '2nd_hypergeometric', '2nd_hypergeometric_Integral', + '2nd_power_series_ordinary') + + sol = Eq(f(x), C2*(-x**4/3 + x**2 + 1) + C1*x + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_ordinary') == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = f(x).diff(x, 2) + x*(f(x).diff(x)) + f(x) + assert classify_ode(eq) == ('factorable', '2nd_power_series_ordinary',) + sol = Eq(f(x), C2*(x**4/8 - x**2/2 + 1) + C1*x*(-x**2/3 + 1) + O(x**6)) + assert dsolve(eq) == sol + # FIXME: checkodesol fails for this solution... + # assert checkodesol(eq, sol) == (True, 0) + + eq = f(x).diff(x, 2) + f(x).diff(x) - x*f(x) + assert classify_ode(eq) == ('2nd_power_series_ordinary',) + sol = Eq(f(x), C2*(-x**4/24 + x**3/6 + 1) + + C1*x*(x**3/24 + x**2/6 - x/2 + 1) + O(x**6)) + assert dsolve(eq) == sol + # FIXME: checkodesol fails for this solution... + # assert checkodesol(eq, sol) == (True, 0) + + eq = f(x).diff(x, 2) + x*f(x) + assert classify_ode(eq) == ('2nd_linear_airy', '2nd_power_series_ordinary') + sol = Eq(f(x), C2*(x**6/180 - x**3/6 + 1) + C1*x*(-x**3/12 + 1) + O(x**7)) + assert dsolve(eq, hint='2nd_power_series_ordinary', n=7) == sol + assert checkodesol(eq, sol) == (True, 0) + + +def test_2nd_power_series_regular(): + C1, C2, a = symbols("C1 C2 a") + eq = x**2*(f(x).diff(x, 2)) - 3*x*(f(x).diff(x)) + (4*x + 4)*f(x) + sol = Eq(f(x), C1*x**2*(-16*x**3/9 + 4*x**2 - 4*x + 1) + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_regular') == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = 4*x**2*(f(x).diff(x, 2)) -8*x**2*(f(x).diff(x)) + (4*x**2 + + 1)*f(x) + sol = Eq(f(x), C1*sqrt(x)*(x**4/24 + x**3/6 + x**2/2 + x + 1) + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_regular') == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = x**2*(f(x).diff(x, 2)) - x**2*(f(x).diff(x)) + ( + x**2 - 2)*f(x) + sol = Eq(f(x), C1*(-x**6/720 - 3*x**5/80 - x**4/8 + x**2/2 + x/2 + 1)/x + + C2*x**2*(-x**3/60 + x**2/20 + x/2 + 1) + O(x**6)) + assert dsolve(eq) == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - Rational(1, 4))*f(x) + sol = Eq(f(x), C1*(x**4/24 - x**2/2 + 1)/sqrt(x) + + C2*sqrt(x)*(x**4/120 - x**2/6 + 1) + O(x**6)) + assert dsolve(eq, hint='2nd_power_series_regular') == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = x*f(x).diff(x, 2) + f(x).diff(x) - a*x*f(x) + sol = Eq(f(x), C1*(a**2*x**4/64 + a*x**2/4 + 1) + O(x**6)) + assert dsolve(eq, f(x), hint="2nd_power_series_regular") == sol + assert checkodesol(eq, sol) == (True, 0) + + eq = f(x).diff(x, 2) + ((1 - x)/x)*f(x).diff(x) + (a/x)*f(x) + sol = Eq(f(x), C1*(-a*x**5*(a - 4)*(a - 3)*(a - 2)*(a - 1)/14400 + \ + a*x**4*(a - 3)*(a - 2)*(a - 1)/576 - a*x**3*(a - 2)*(a - 1)/36 + \ + a*x**2*(a - 1)/4 - a*x + 1) + O(x**6)) + assert dsolve(eq, f(x), hint="2nd_power_series_regular") == sol + assert checkodesol(eq, sol) == (True, 0) + + +def test_issue_15056(): + t = Symbol('t') + C3 = Symbol('C3') + assert get_numbered_constants(Symbol('C1') * Function('C2')(t)) == C3 + + +def test_issue_15913(): + eq = -C1/x - 2*x*f(x) - f(x) + Derivative(f(x), x) + sol = C2*exp(x**2 + x) + exp(x**2 + x)*Integral(C1*exp(-x**2 - x)/x, x) + assert checkodesol(eq, sol) == (True, 0) + sol = C1 + C2*exp(-x*y) + eq = Derivative(y*f(x), x) + f(x).diff(x, 2) + assert checkodesol(eq, sol, f(x)) == (True, 0) + + +def test_issue_16146(): + raises(ValueError, lambda: dsolve([f(x).diff(x), g(x).diff(x)], [f(x), g(x), h(x)])) + raises(ValueError, lambda: dsolve([f(x).diff(x), g(x).diff(x)], [f(x)])) + + +def test_dsolve_remove_redundant_solutions(): + + eq = (f(x)-2)*f(x).diff(x) + sol = Eq(f(x), C1) + assert dsolve(eq) == sol + + eq = (f(x)-sin(x))*(f(x).diff(x, 2)) + sol = {Eq(f(x), C1 + C2*x), Eq(f(x), sin(x))} + assert set(dsolve(eq)) == sol + + eq = (f(x)**2-2*f(x)+1)*f(x).diff(x, 3) + sol = Eq(f(x), C1 + C2*x + C3*x**2) + assert dsolve(eq) == sol + + +def test_issue_13060(): + A, B = symbols("A B", cls=Function) + t = Symbol("t") + eq = [Eq(Derivative(A(t), t), A(t)*B(t)), Eq(Derivative(B(t), t), A(t)*B(t))] + sol = dsolve(eq) + assert checkodesol(eq, sol) == (True, [0, 0]) + + +def test_issue_22523(): + N, s = symbols('N s') + rho = Function('rho') + # intentionally use 4.0 to confirm issue with nfloat + # works here + eqn = 4.0*N*sqrt(N - 1)*rho(s) + (4*s**2*(N - 1) + (N - 2*s*(N - 1))**2 + )*Derivative(rho(s), (s, 2)) + match = classify_ode(eqn, dict=True, hint='all') + assert match['2nd_power_series_ordinary']['terms'] == 5 + C1, C2 = symbols('C1,C2') + sol = dsolve(eqn, hint='2nd_power_series_ordinary') + # there is no r(2.0) in this result + assert filldedent(sol) == filldedent(str(''' + Eq(rho(s), C2*(1 - 4.0*s**4*sqrt(N - 1.0)/N + 0.666666666666667*s**4/N + - 2.66666666666667*s**3*sqrt(N - 1.0)/N - 2.0*s**2*sqrt(N - 1.0)/N + + 9.33333333333333*s**4*sqrt(N - 1.0)/N**2 - 0.666666666666667*s**4/N**2 + + 2.66666666666667*s**3*sqrt(N - 1.0)/N**2 - + 5.33333333333333*s**4*sqrt(N - 1.0)/N**3) + C1*s*(1.0 - + 1.33333333333333*s**3*sqrt(N - 1.0)/N - 0.666666666666667*s**2*sqrt(N + - 1.0)/N + 1.33333333333333*s**3*sqrt(N - 1.0)/N**2) + O(s**6))''')) + + +def test_issue_22604(): + x1, x2 = symbols('x1, x2', cls = Function) + t, k1, k2, m1, m2 = symbols('t k1 k2 m1 m2', real = True) + k1, k2, m1, m2 = 1, 1, 1, 1 + eq1 = Eq(m1*diff(x1(t), t, 2) + k1*x1(t) - k2*(x2(t) - x1(t)), 0) + eq2 = Eq(m2*diff(x2(t), t, 2) + k2*(x2(t) - x1(t)), 0) + eqs = [eq1, eq2] + [x1sol, x2sol] = dsolve(eqs, [x1(t), x2(t)], ics = {x1(0):0, x1(t).diff().subs(t,0):0, \ + x2(0):1, x2(t).diff().subs(t,0):0}) + assert x1sol == Eq(x1(t), sqrt(3 - sqrt(5))*(sqrt(10) + 5*sqrt(2))*cos(sqrt(2)*t*sqrt(3 - sqrt(5))/2)/20 + \ + (-5*sqrt(2) + sqrt(10))*sqrt(sqrt(5) + 3)*cos(sqrt(2)*t*sqrt(sqrt(5) + 3)/2)/20) + assert x2sol == Eq(x2(t), (sqrt(5) + 5)*cos(sqrt(2)*t*sqrt(3 - sqrt(5))/2)/10 + (5 - sqrt(5))*cos(sqrt(2)*t*sqrt(sqrt(5) + 3)/2)/10) + + +def test_issue_22462(): + for de in [ + Eq(f(x).diff(x), -20*f(x)**2 - 500*f(x)/7200), + Eq(f(x).diff(x), -2*f(x)**2 - 5*f(x)/7)]: + assert 'Bernoulli' in classify_ode(de, f(x)) + + +def test_issue_23425(): + x = symbols('x') + y = Function('y') + eq = Eq(-E**x*y(x).diff().diff() + y(x).diff(), 0) + assert classify_ode(eq) == \ + ('Liouville', 'nth_order_reducible', \ + '2nd_power_series_ordinary', 'Liouville_Integral') + + +@SKIP("too slow for @slow") +def test_issue_25820(): + x = Symbol('x') + y = Function('y') + eq = y(x)**3*y(x).diff(x, 2) + 49 + assert dsolve(eq, y(x)) is not None # doesn't raise diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_riccati.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_riccati.py new file mode 100644 index 0000000000000000000000000000000000000000..548a1ee5b5e82d88f1b0aa319af09b8b9d1d9bfe --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_riccati.py @@ -0,0 +1,877 @@ +from sympy.core.random import randint +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, oo) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import tanh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin +from sympy.polys.polytools import Poly +from sympy.simplify.ratsimp import ratsimp +from sympy.solvers.ode.subscheck import checkodesol +from sympy.testing.pytest import slow +from sympy.solvers.ode.riccati import (riccati_normal, riccati_inverse_normal, + riccati_reduced, match_riccati, inverse_transform_poly, limit_at_inf, + check_necessary_conds, val_at_inf, construct_c_case_1, + construct_c_case_2, construct_c_case_3, construct_d_case_4, + construct_d_case_5, construct_d_case_6, rational_laurent_series, + solve_riccati) + +f = Function('f') +x = symbols('x') + +# These are the functions used to generate the tests +# SHOULD NOT BE USED DIRECTLY IN TESTS + +def rand_rational(maxint): + return Rational(randint(-maxint, maxint), randint(1, maxint)) + + +def rand_poly(x, degree, maxint): + return Poly([rand_rational(maxint) for _ in range(degree+1)], x) + + +def rand_rational_function(x, degree, maxint): + degnum = randint(1, degree) + degden = randint(1, degree) + num = rand_poly(x, degnum, maxint) + den = rand_poly(x, degden, maxint) + while den == Poly(0, x): + den = rand_poly(x, degden, maxint) + return num / den + + +def find_riccati_ode(ratfunc, x, yf): + y = ratfunc + yp = y.diff(x) + q1 = rand_rational_function(x, 1, 3) + q2 = rand_rational_function(x, 1, 3) + while q2 == 0: + q2 = rand_rational_function(x, 1, 3) + q0 = ratsimp(yp - q1*y - q2*y**2) + eq = Eq(yf.diff(), q0 + q1*yf + q2*yf**2) + sol = Eq(yf, y) + assert checkodesol(eq, sol) == (True, 0) + return eq, q0, q1, q2 + + +# Testing functions start + +def test_riccati_transformation(): + """ + This function tests the transformation of the + solution of a Riccati ODE to the solution of + its corresponding normal Riccati ODE. + + Each test case 4 values - + + 1. w - The solution to be transformed + 2. b1 - The coefficient of f(x) in the ODE. + 3. b2 - The coefficient of f(x)**2 in the ODE. + 4. y - The solution to the normal Riccati ODE. + """ + tests = [ + ( + x/(x - 1), + (x**2 + 7)/3*x, + x, + -x**2/(x - 1) - x*(x**2/3 + S(7)/3)/2 - 1/(2*x) + ), + ( + (2*x + 3)/(2*x + 2), + (3 - 3*x)/(x + 1), + 5*x, + -5*x*(2*x + 3)/(2*x + 2) - (3 - 3*x)/(Mul(2, x + 1, evaluate=False)) - 1/(2*x) + ), + ( + -1/(2*x**2 - 1), + 0, + (2 - x)/(4*x - 2), + (2 - x)/((4*x - 2)*(2*x**2 - 1)) - (4*x - 2)*(Mul(-4, 2 - x, evaluate=False)/(4*x - \ + 2)**2 - 1/(4*x - 2))/(Mul(2, 2 - x, evaluate=False)) + ), + ( + x, + (8*x - 12)/(12*x + 9), + x**3/(6*x - 9), + -x**4/(6*x - 9) - (8*x - 12)/(Mul(2, 12*x + 9, evaluate=False)) - (6*x - 9)*(-6*x**3/(6*x \ + - 9)**2 + 3*x**2/(6*x - 9))/(2*x**3) + )] + for w, b1, b2, y in tests: + assert y == riccati_normal(w, x, b1, b2) + assert w == riccati_inverse_normal(y, x, b1, b2).cancel() + + # Test bp parameter in riccati_inverse_normal + tests = [ + ( + (-2*x - 1)/(2*x**2 + 2*x - 2), + -2/x, + (-x - 1)/(4*x), + 8*x**2*(1/(4*x) + (-x - 1)/(4*x**2))/(-x - 1)**2 + 4/(-x - 1), + -2*x*(-1/(4*x) - (-x - 1)/(4*x**2))/(-x - 1) - (-2*x - 1)*(-x - 1)/(4*x*(2*x**2 + 2*x \ + - 2)) + 1/x + ), + ( + 3/(2*x**2), + -2/x, + (-x - 1)/(4*x), + 8*x**2*(1/(4*x) + (-x - 1)/(4*x**2))/(-x - 1)**2 + 4/(-x - 1), + -2*x*(-1/(4*x) - (-x - 1)/(4*x**2))/(-x - 1) + 1/x - Mul(3, -x - 1, evaluate=False)/(8*x**3) + )] + for w, b1, b2, bp, y in tests: + assert y == riccati_normal(w, x, b1, b2) + assert w == riccati_inverse_normal(y, x, b1, b2, bp).cancel() + + +def test_riccati_reduced(): + """ + This function tests the transformation of a + Riccati ODE to its normal Riccati ODE. + + Each test case 2 values - + + 1. eq - A Riccati ODE. + 2. normal_eq - The normal Riccati ODE of eq. + """ + tests = [ + ( + f(x).diff(x) - x**2 - x*f(x) - x*f(x)**2, + + f(x).diff(x) + f(x)**2 + x**3 - x**2/4 - 3/(4*x**2) + ), + ( + 6*x/(2*x + 9) + f(x).diff(x) - (x + 1)*f(x)**2/x, + + -3*x**2*(1/x + (-x - 1)/x**2)**2/(4*(-x - 1)**2) + Mul(6, \ + -x - 1, evaluate=False)/(2*x + 9) + f(x)**2 + f(x).diff(x) \ + - (-1 + (x + 1)/x)/(x*(-x - 1)) + ), + ( + f(x)**2 + f(x).diff(x) - (x - 1)*f(x)/(-x - S(1)/2), + + -(2*x - 2)**2/(4*(2*x + 1)**2) + (2*x - 2)/(2*x + 1)**2 + \ + f(x)**2 + f(x).diff(x) - 1/(2*x + 1) + ), + ( + f(x).diff(x) - f(x)**2/x, + + f(x)**2 + f(x).diff(x) + 1/(4*x**2) + ), + ( + -3*(-x**2 - x + 1)/(x**2 + 6*x + 1) + f(x).diff(x) + f(x)**2/x, + + f(x)**2 + f(x).diff(x) + (3*x**2/(x**2 + 6*x + 1) + 3*x/(x**2 \ + + 6*x + 1) - 3/(x**2 + 6*x + 1))/x + 1/(4*x**2) + ), + ( + 6*x/(2*x + 9) + f(x).diff(x) - (x + 1)*f(x)/x, + + False + ), + ( + f(x)*f(x).diff(x) - 1/x + f(x)/3 + f(x)**2/(x**2 - 2), + + False + )] + for eq, normal_eq in tests: + assert normal_eq == riccati_reduced(eq, f, x) + + +def test_match_riccati(): + """ + This function tests if an ODE is Riccati or not. + + Each test case has 5 values - + + 1. eq - The Riccati ODE. + 2. match - Boolean indicating if eq is a Riccati ODE. + 3. b0 - + 4. b1 - Coefficient of f(x) in eq. + 5. b2 - Coefficient of f(x)**2 in eq. + """ + tests = [ + # Test Rational Riccati ODEs + ( + f(x).diff(x) - (405*x**3 - 882*x**2 - 78*x + 92)/(243*x**4 \ + - 945*x**3 + 846*x**2 + 180*x - 72) - 2 - f(x)**2/(3*x + 1) \ + - (S(1)/3 - x)*f(x)/(S(1)/3 - 3*x/2), + + True, + + 45*x**3/(27*x**4 - 105*x**3 + 94*x**2 + 20*x - 8) - 98*x**2/ \ + (27*x**4 - 105*x**3 + 94*x**2 + 20*x - 8) - 26*x/(81*x**4 - \ + 315*x**3 + 282*x**2 + 60*x - 24) + 2 + 92/(243*x**4 - 945*x**3 \ + + 846*x**2 + 180*x - 72), + + Mul(-1, 2 - 6*x, evaluate=False)/(9*x - 2), + + 1/(3*x + 1) + ), + ( + f(x).diff(x) + 4*x/27 - (x/3 - 1)*f(x)**2 - (2*x/3 + \ + 1)*f(x)/(3*x + 2) - S(10)/27 - (265*x**2 + 423*x + 162) \ + /(324*x**3 + 216*x**2), + + True, + + -4*x/27 + S(10)/27 + 3/(6*x**3 + 4*x**2) + 47/(36*x**2 \ + + 24*x) + 265/(324*x + 216), + + Mul(-1, -2*x - 3, evaluate=False)/(9*x + 6), + + x/3 - 1 + ), + ( + f(x).diff(x) - (304*x**5 - 745*x**4 + 631*x**3 - 876*x**2 \ + + 198*x - 108)/(36*x**6 - 216*x**5 + 477*x**4 - 567*x**3 + \ + 360*x**2 - 108*x) - S(17)/9 - (x - S(3)/2)*f(x)/(x/2 - \ + S(3)/2) - (x/3 - 3)*f(x)**2/(3*x), + + True, + + 304*x**4/(36*x**5 - 216*x**4 + 477*x**3 - 567*x**2 + 360*x - \ + 108) - 745*x**3/(36*x**5 - 216*x**4 + 477*x**3 - 567*x**2 + \ + 360*x - 108) + 631*x**2/(36*x**5 - 216*x**4 + 477*x**3 - 567* \ + x**2 + 360*x - 108) - 292*x/(12*x**5 - 72*x**4 + 159*x**3 - \ + 189*x**2 + 120*x - 36) + S(17)/9 - 12/(4*x**6 - 24*x**5 + \ + 53*x**4 - 63*x**3 + 40*x**2 - 12*x) + 22/(4*x**5 - 24*x**4 \ + + 53*x**3 - 63*x**2 + 40*x - 12), + + Mul(-1, 3 - 2*x, evaluate=False)/(x - 3), + + Mul(-1, 9 - x, evaluate=False)/(9*x) + ), + # Test Non-Rational Riccati ODEs + ( + f(x).diff(x) - x**(S(3)/2)/(x**(S(1)/2) - 2) + x**2*f(x) + \ + x*f(x)**2/(x**(S(3)/4)), + False, 0, 0, 0 + ), + ( + f(x).diff(x) - sin(x**2) + exp(x)*f(x) + log(x)*f(x)**2, + False, 0, 0, 0 + ), + ( + f(x).diff(x) - tanh(x + sqrt(x)) + f(x) + x**4*f(x)**2, + False, 0, 0, 0 + ), + # Test Non-Riccati ODEs + ( + (1 - x**2)*f(x).diff(x, 2) - 2*x*f(x).diff(x) + 20*f(x), + False, 0, 0, 0 + ), + ( + f(x).diff(x) - x**2 + x**3*f(x) + (x**2/(x + 1))*f(x)**3, + False, 0, 0, 0 + ), + ( + f(x).diff(x)*f(x)**2 + (x**2 - 1)/(x**3 + 1)*f(x) + 1/(2*x \ + + 3) + f(x)**2, + False, 0, 0, 0 + )] + for eq, res, b0, b1, b2 in tests: + match, funcs = match_riccati(eq, f, x) + assert match == res + if res: + assert [b0, b1, b2] == funcs + + +def test_val_at_inf(): + """ + This function tests the valuation of rational + function at oo. + + Each test case has 3 values - + + 1. num - Numerator of rational function. + 2. den - Denominator of rational function. + 3. val_inf - Valuation of rational function at oo + """ + tests = [ + # degree(denom) > degree(numer) + ( + Poly(10*x**3 + 8*x**2 - 13*x + 6, x), + Poly(-13*x**10 - x**9 + 5*x**8 + 7*x**7 + 10*x**6 + 6*x**5 - 7*x**4 + 11*x**3 - 8*x**2 + 5*x + 13, x), + 7 + ), + ( + Poly(1, x), + Poly(-9*x**4 + 3*x**3 + 15*x**2 - 6*x - 14, x), + 4 + ), + # degree(denom) == degree(numer) + ( + Poly(-6*x**3 - 8*x**2 + 8*x - 6, x), + Poly(-5*x**3 + 12*x**2 - 6*x - 9, x), + 0 + ), + # degree(denom) < degree(numer) + ( + Poly(12*x**8 - 12*x**7 - 11*x**6 + 8*x**5 + 3*x**4 - x**3 + x**2 - 11*x, x), + Poly(-14*x**2 + x, x), + -6 + ), + ( + Poly(5*x**6 + 9*x**5 - 11*x**4 - 9*x**3 + x**2 - 4*x + 4, x), + Poly(15*x**4 + 3*x**3 - 8*x**2 + 15*x + 12, x), + -2 + )] + for num, den, val in tests: + assert val_at_inf(num, den, x) == val + + +def test_necessary_conds(): + """ + This function tests the necessary conditions for + a Riccati ODE to have a rational particular solution. + """ + # Valuation at Infinity is an odd negative integer + assert check_necessary_conds(-3, [1, 2, 4]) == False + # Valuation at Infinity is a positive integer lesser than 2 + assert check_necessary_conds(1, [1, 2, 4]) == False + # Multiplicity of a pole is an odd integer greater than 1 + assert check_necessary_conds(2, [3, 1, 6]) == False + # All values are correct + assert check_necessary_conds(-10, [1, 2, 8, 12]) == True + + +def test_inverse_transform_poly(): + """ + This function tests the substitution x -> 1/x + in rational functions represented using Poly. + """ + fns = [ + (15*x**3 - 8*x**2 - 2*x - 6)/(18*x + 6), + + (180*x**5 + 40*x**4 + 80*x**3 + 30*x**2 - 60*x - 80)/(180*x**3 - 150*x**2 + 75*x + 12), + + (-15*x**5 - 36*x**4 + 75*x**3 - 60*x**2 - 80*x - 60)/(80*x**4 + 60*x**3 + 60*x**2 + 60*x - 80), + + (60*x**7 + 24*x**6 - 15*x**5 - 20*x**4 + 30*x**2 + 100*x - 60)/(240*x**2 - 20*x - 30), + + (30*x**6 - 12*x**5 + 15*x**4 - 15*x**2 + 10*x + 60)/(3*x**10 - 45*x**9 + 15*x**5 + 15*x**4 - 5*x**3 \ + + 15*x**2 + 45*x - 15) + ] + for f in fns: + num, den = [Poly(e, x) for e in f.as_numer_denom()] + num, den = inverse_transform_poly(num, den, x) + assert f.subs(x, 1/x).cancel() == num/den + + +def test_limit_at_inf(): + """ + This function tests the limit at oo of a + rational function. + + Each test case has 3 values - + + 1. num - Numerator of rational function. + 2. den - Denominator of rational function. + 3. limit_at_inf - Limit of rational function at oo + """ + tests = [ + # deg(denom) > deg(numer) + ( + Poly(-12*x**2 + 20*x + 32, x), + Poly(32*x**3 + 72*x**2 + 3*x - 32, x), + 0 + ), + # deg(denom) < deg(numer) + ( + Poly(1260*x**4 - 1260*x**3 - 700*x**2 - 1260*x + 1400, x), + Poly(6300*x**3 - 1575*x**2 + 756*x - 540, x), + oo + ), + # deg(denom) < deg(numer), one of the leading coefficients is negative + ( + Poly(-735*x**8 - 1400*x**7 + 1680*x**6 - 315*x**5 - 600*x**4 + 840*x**3 - 525*x**2 \ + + 630*x + 3780, x), + Poly(1008*x**7 - 2940*x**6 - 84*x**5 + 2940*x**4 - 420*x**3 + 1512*x**2 + 105*x + 168, x), + -oo + ), + # deg(denom) == deg(numer) + ( + Poly(105*x**7 - 960*x**6 + 60*x**5 + 60*x**4 - 80*x**3 + 45*x**2 + 120*x + 15, x), + Poly(735*x**7 + 525*x**6 + 720*x**5 + 720*x**4 - 8400*x**3 - 2520*x**2 + 2800*x + 280, x), + S(1)/7 + ), + ( + Poly(288*x**4 - 450*x**3 + 280*x**2 - 900*x - 90, x), + Poly(607*x**4 + 840*x**3 - 1050*x**2 + 420*x + 420, x), + S(288)/607 + )] + for num, den, lim in tests: + assert limit_at_inf(num, den, x) == lim + + +def test_construct_c_case_1(): + """ + This function tests the Case 1 in the step + to calculate coefficients of c-vectors. + + Each test case has 4 values - + + 1. num - Numerator of the rational function a(x). + 2. den - Denominator of the rational function a(x). + 3. pole - Pole of a(x) for which c-vector is being + calculated. + 4. c - The c-vector for the pole. + """ + tests = [ + ( + Poly(-3*x**3 + 3*x**2 + 4*x - 5, x, extension=True), + Poly(4*x**8 + 16*x**7 + 9*x**5 + 12*x**4 + 6*x**3 + 12*x**2, x, extension=True), + S(0), + [[S(1)/2 + sqrt(6)*I/6], [S(1)/2 - sqrt(6)*I/6]] + ), + ( + Poly(1200*x**3 + 1440*x**2 + 816*x + 560, x, extension=True), + Poly(128*x**5 - 656*x**4 + 1264*x**3 - 1125*x**2 + 385*x + 49, x, extension=True), + S(7)/4, + [[S(1)/2 + sqrt(16367978)/634], [S(1)/2 - sqrt(16367978)/634]] + ), + ( + Poly(4*x + 2, x, extension=True), + Poly(18*x**4 + (2 - 18*sqrt(3))*x**3 + (14 - 11*sqrt(3))*x**2 + (4 - 6*sqrt(3))*x \ + + 8*sqrt(3) + 16, x, domain='QQ'), + (S(1) + sqrt(3))/2, + [[S(1)/2 + sqrt(Mul(4, 2*sqrt(3) + 4, evaluate=False)/(19*sqrt(3) + 44) + 1)/2], \ + [S(1)/2 - sqrt(Mul(4, 2*sqrt(3) + 4, evaluate=False)/(19*sqrt(3) + 44) + 1)/2]] + )] + for num, den, pole, c in tests: + assert construct_c_case_1(num, den, x, pole) == c + + +def test_construct_c_case_2(): + """ + This function tests the Case 2 in the step + to calculate coefficients of c-vectors. + + Each test case has 5 values - + + 1. num - Numerator of the rational function a(x). + 2. den - Denominator of the rational function a(x). + 3. pole - Pole of a(x) for which c-vector is being + calculated. + 4. mul - The multiplicity of the pole. + 5. c - The c-vector for the pole. + """ + tests = [ + # Testing poles with multiplicity 2 + ( + Poly(1, x, extension=True), + Poly((x - 1)**2*(x - 2), x, extension=True), + 1, 2, + [[-I*(-1 - I)/2], [I*(-1 + I)/2]] + ), + ( + Poly(3*x**5 - 12*x**4 - 7*x**3 + 1, x, extension=True), + Poly((3*x - 1)**2*(x + 2)**2, x, extension=True), + S(1)/3, 2, + [[-S(89)/98], [-S(9)/98]] + ), + # Testing poles with multiplicity 4 + ( + Poly(x**3 - x**2 + 4*x, x, extension=True), + Poly((x - 2)**4*(x + 5)**2, x, extension=True), + 2, 4, + [[7*sqrt(3)*(S(60)/343 - 4*sqrt(3)/7)/12, 2*sqrt(3)/7], \ + [-7*sqrt(3)*(S(60)/343 + 4*sqrt(3)/7)/12, -2*sqrt(3)/7]] + ), + ( + Poly(3*x**5 + x**4 + 3, x, extension=True), + Poly((4*x + 1)**4*(x + 2), x, extension=True), + -S(1)/4, 4, + [[128*sqrt(439)*(-sqrt(439)/128 - S(55)/14336)/439, sqrt(439)/256], \ + [-128*sqrt(439)*(sqrt(439)/128 - S(55)/14336)/439, -sqrt(439)/256]] + ), + # Testing poles with multiplicity 6 + ( + Poly(x**3 + 2, x, extension=True), + Poly((3*x - 1)**6*(x**2 + 1), x, extension=True), + S(1)/3, 6, + [[27*sqrt(66)*(-sqrt(66)/54 - S(131)/267300)/22, -2*sqrt(66)/1485, sqrt(66)/162], \ + [-27*sqrt(66)*(sqrt(66)/54 - S(131)/267300)/22, 2*sqrt(66)/1485, -sqrt(66)/162]] + ), + ( + Poly(x**2 + 12, x, extension=True), + Poly((x - sqrt(2))**6, x, extension=True), + sqrt(2), 6, + [[sqrt(14)*(S(6)/7 - 3*sqrt(14))/28, sqrt(7)/7, sqrt(14)], \ + [-sqrt(14)*(S(6)/7 + 3*sqrt(14))/28, -sqrt(7)/7, -sqrt(14)]] + )] + for num, den, pole, mul, c in tests: + assert construct_c_case_2(num, den, x, pole, mul) == c + + +def test_construct_c_case_3(): + """ + This function tests the Case 3 in the step + to calculate coefficients of c-vectors. + """ + assert construct_c_case_3() == [[1]] + + +def test_construct_d_case_4(): + """ + This function tests the Case 4 in the step + to calculate coefficients of the d-vector. + + Each test case has 4 values - + + 1. num - Numerator of the rational function a(x). + 2. den - Denominator of the rational function a(x). + 3. mul - Multiplicity of oo as a pole. + 4. d - The d-vector. + """ + tests = [ + # Tests with multiplicity at oo = 2 + ( + Poly(-x**5 - 2*x**4 + 4*x**3 + 2*x + 5, x, extension=True), + Poly(9*x**3 - 2*x**2 + 10*x - 2, x, extension=True), + 2, + [[10*I/27, I/3, -3*I*(S(158)/243 - I/3)/2], \ + [-10*I/27, -I/3, 3*I*(S(158)/243 + I/3)/2]] + ), + ( + Poly(-x**6 + 9*x**5 + 5*x**4 + 6*x**3 + 5*x**2 + 6*x + 7, x, extension=True), + Poly(x**4 + 3*x**3 + 12*x**2 - x + 7, x, extension=True), + 2, + [[-6*I, I, -I*(17 - I)/2], [6*I, -I, I*(17 + I)/2]] + ), + # Tests with multiplicity at oo = 4 + ( + Poly(-2*x**6 - x**5 - x**4 - 2*x**3 - x**2 - 3*x - 3, x, extension=True), + Poly(3*x**2 + 10*x + 7, x, extension=True), + 4, + [[269*sqrt(6)*I/288, -17*sqrt(6)*I/36, sqrt(6)*I/3, -sqrt(6)*I*(S(16969)/2592 \ + - 2*sqrt(6)*I/3)/4], [-269*sqrt(6)*I/288, 17*sqrt(6)*I/36, -sqrt(6)*I/3, \ + sqrt(6)*I*(S(16969)/2592 + 2*sqrt(6)*I/3)/4]] + ), + ( + Poly(-3*x**5 - 3*x**4 - 3*x**3 - x**2 - 1, x, extension=True), + Poly(12*x - 2, x, extension=True), + 4, + [[41*I/192, 7*I/24, I/2, -I*(-S(59)/6912 - I)], \ + [-41*I/192, -7*I/24, -I/2, I*(-S(59)/6912 + I)]] + ), + # Tests with multiplicity at oo = 4 + ( + Poly(-x**7 - x**5 - x**4 - x**2 - x, x, extension=True), + Poly(x + 2, x, extension=True), + 6, + [[-5*I/2, 2*I, -I, I, -I*(-9 - 3*I)/2], [5*I/2, -2*I, I, -I, I*(-9 + 3*I)/2]] + ), + ( + Poly(-x**7 - x**6 - 2*x**5 - 2*x**4 - x**3 - x**2 + 2*x - 2, x, extension=True), + Poly(2*x - 2, x, extension=True), + 6, + [[3*sqrt(2)*I/4, 3*sqrt(2)*I/4, sqrt(2)*I/2, sqrt(2)*I/2, -sqrt(2)*I*(-S(7)/8 - \ + 3*sqrt(2)*I/2)/2], [-3*sqrt(2)*I/4, -3*sqrt(2)*I/4, -sqrt(2)*I/2, -sqrt(2)*I/2, \ + sqrt(2)*I*(-S(7)/8 + 3*sqrt(2)*I/2)/2]] + )] + for num, den, mul, d in tests: + ser = rational_laurent_series(num, den, x, oo, mul, 1) + assert construct_d_case_4(ser, mul//2) == d + + +def test_construct_d_case_5(): + """ + This function tests the Case 5 in the step + to calculate coefficients of the d-vector. + + Each test case has 3 values - + + 1. num - Numerator of the rational function a(x). + 2. den - Denominator of the rational function a(x). + 3. d - The d-vector. + """ + tests = [ + ( + Poly(2*x**3 + x**2 + x - 2, x, extension=True), + Poly(9*x**3 + 5*x**2 + 2*x - 1, x, extension=True), + [[sqrt(2)/3, -sqrt(2)/108], [-sqrt(2)/3, sqrt(2)/108]] + ), + ( + Poly(3*x**5 + x**4 - x**3 + x**2 - 2*x - 2, x, domain='ZZ'), + Poly(9*x**5 + 7*x**4 + 3*x**3 + 2*x**2 + 5*x + 7, x, domain='ZZ'), + [[sqrt(3)/3, -2*sqrt(3)/27], [-sqrt(3)/3, 2*sqrt(3)/27]] + ), + ( + Poly(x**2 - x + 1, x, domain='ZZ'), + Poly(3*x**2 + 7*x + 3, x, domain='ZZ'), + [[sqrt(3)/3, -5*sqrt(3)/9], [-sqrt(3)/3, 5*sqrt(3)/9]] + )] + for num, den, d in tests: + # Multiplicity of oo is 0 + ser = rational_laurent_series(num, den, x, oo, 0, 1) + assert construct_d_case_5(ser) == d + + +def test_construct_d_case_6(): + """ + This function tests the Case 6 in the step + to calculate coefficients of the d-vector. + + Each test case has 3 values - + + 1. num - Numerator of the rational function a(x). + 2. den - Denominator of the rational function a(x). + 3. d - The d-vector. + """ + tests = [ + ( + Poly(-2*x**2 - 5, x, domain='ZZ'), + Poly(4*x**4 + 2*x**2 + 10*x + 2, x, domain='ZZ'), + [[S(1)/2 + I/2], [S(1)/2 - I/2]] + ), + ( + Poly(-2*x**3 - 4*x**2 - 2*x - 5, x, domain='ZZ'), + Poly(x**6 - x**5 + 2*x**4 - 4*x**3 - 5*x**2 - 5*x + 9, x, domain='ZZ'), + [[1], [0]] + ), + ( + Poly(-5*x**3 + x**2 + 11*x + 12, x, domain='ZZ'), + Poly(6*x**8 - 26*x**7 - 27*x**6 - 10*x**5 - 44*x**4 - 46*x**3 - 34*x**2 \ + - 27*x - 42, x, domain='ZZ'), + [[1], [0]] + )] + for num, den, d in tests: + assert construct_d_case_6(num, den, x) == d + + +def test_rational_laurent_series(): + """ + This function tests the computation of coefficients + of Laurent series of a rational function. + + Each test case has 5 values - + + 1. num - Numerator of the rational function. + 2. den - Denominator of the rational function. + 3. x0 - Point about which Laurent series is to + be calculated. + 4. mul - Multiplicity of x0 if x0 is a pole of + the rational function (0 otherwise). + 5. n - Number of terms upto which the series + is to be calculated. + """ + tests = [ + # Laurent series about simple pole (Multiplicity = 1) + ( + Poly(x**2 - 3*x + 9, x, extension=True), + Poly(x**2 - x, x, extension=True), + S(1), 1, 6, + {1: 7, 0: -8, -1: 9, -2: -9, -3: 9, -4: -9} + ), + # Laurent series about multiple pole (Multiplicity > 1) + ( + Poly(64*x**3 - 1728*x + 1216, x, extension=True), + Poly(64*x**4 - 80*x**3 - 831*x**2 + 1809*x - 972, x, extension=True), + S(9)/8, 2, 3, + {0: S(32177152)/46521675, 2: S(1019)/984, -1: S(11947565056)/28610830125, \ + 1: S(209149)/75645} + ), + ( + Poly(1, x, extension=True), + Poly(x**5 + (-4*sqrt(2) - 1)*x**4 + (4*sqrt(2) + 12)*x**3 + (-12 - 8*sqrt(2))*x**2 \ + + (4 + 8*sqrt(2))*x - 4, x, extension=True), + sqrt(2), 4, 6, + {4: 1 + sqrt(2), 3: -3 - 2*sqrt(2), 2: Mul(-1, -3 - 2*sqrt(2), evaluate=False)/(-1 \ + + sqrt(2)), 1: (-3 - 2*sqrt(2))/(-1 + sqrt(2))**2, 0: Mul(-1, -3 - 2*sqrt(2), evaluate=False \ + )/(-1 + sqrt(2))**3, -1: (-3 - 2*sqrt(2))/(-1 + sqrt(2))**4} + ), + # Laurent series about oo + ( + Poly(x**5 - 4*x**3 + 6*x**2 + 10*x - 13, x, extension=True), + Poly(x**2 - 5, x, extension=True), + oo, 3, 6, + {3: 1, 2: 0, 1: 1, 0: 6, -1: 15, -2: 17} + ), + # Laurent series at x0 where x0 is not a pole of the function + # Using multiplicity as 0 (as x0 will not be a pole) + ( + Poly(3*x**3 + 6*x**2 - 2*x + 5, x, extension=True), + Poly(9*x**4 - x**3 - 3*x**2 + 4*x + 4, x, extension=True), + S(2)/5, 0, 1, + {0: S(3345)/3304, -1: S(399325)/2729104, -2: S(3926413375)/4508479808, \ + -3: S(-5000852751875)/1862002160704, -4: S(-6683640101653125)/6152055138966016} + ), + ( + Poly(-7*x**2 + 2*x - 4, x, extension=True), + Poly(7*x**5 + 9*x**4 + 8*x**3 + 3*x**2 + 6*x + 9, x, extension=True), + oo, 0, 6, + {0: 0, -2: 0, -5: -S(71)/49, -1: 0, -3: -1, -4: S(11)/7} + )] + for num, den, x0, mul, n, ser in tests: + assert ser == rational_laurent_series(num, den, x, x0, mul, n) + + +def check_dummy_sol(eq, solse, dummy_sym): + """ + Helper function to check if actual solution + matches expected solution if actual solution + contains dummy symbols. + """ + if isinstance(eq, Eq): + eq = eq.lhs - eq.rhs + _, funcs = match_riccati(eq, f, x) + + sols = solve_riccati(f(x), x, *funcs) + C1 = Dummy('C1') + sols = [sol.subs(C1, dummy_sym) for sol in sols] + + assert all(x[0] for x in checkodesol(eq, sols)) + assert all(s1.dummy_eq(s2, dummy_sym) for s1, s2 in zip(sols, solse)) + + +def test_solve_riccati(): + """ + This function tests the computation of rational + particular solutions for a Riccati ODE. + + Each test case has 2 values - + + 1. eq - Riccati ODE to be solved. + 2. sol - Expected solution to the equation. + + Some examples have been taken from the paper - "Statistical Investigation of + First-Order Algebraic ODEs and their Rational General Solutions" by + Georg Grasegger, N. Thieu Vo, Franz Winkler + + https://www3.risc.jku.at/publications/download/risc_5197/RISCReport15-19.pdf + """ + C0 = Dummy('C0') + # Type: 1st Order Rational Riccati, dy/dx = a + b*y + c*y**2, + # a, b, c are rational functions of x + + tests = [ + # a(x) is a constant + ( + Eq(f(x).diff(x) + f(x)**2 - 2, 0), + [Eq(f(x), sqrt(2)), Eq(f(x), -sqrt(2))] + ), + # a(x) is a constant + ( + f(x)**2 + f(x).diff(x) + 4*f(x)/x + 2/x**2, + [Eq(f(x), (-2*C0 - x)/(C0*x + x**2))] + ), + # a(x) is a constant + ( + 2*x**2*f(x).diff(x) - x*(4*f(x) + f(x).diff(x) - 4) + (f(x) - 1)*f(x), + [Eq(f(x), (C0 + 2*x**2)/(C0 + x))] + ), + # Pole with multiplicity 1 + ( + Eq(f(x).diff(x), -f(x)**2 - 2/(x**3 - x**2)), + [Eq(f(x), 1/(x**2 - x))] + ), + # One pole of multiplicity 2 + ( + x**2 - (2*x + 1/x)*f(x) + f(x)**2 + f(x).diff(x), + [Eq(f(x), (C0*x + x**3 + 2*x)/(C0 + x**2)), Eq(f(x), x)] + ), + ( + x**4*f(x).diff(x) + x**2 - x*(2*f(x)**2 + f(x).diff(x)) + f(x), + [Eq(f(x), (C0*x**2 + x)/(C0 + x**2)), Eq(f(x), x**2)] + ), + # Multiple poles of multiplicity 2 + ( + -f(x)**2 + f(x).diff(x) + (15*x**2 - 20*x + 7)/((x - 1)**2*(2*x \ + - 1)**2), + [Eq(f(x), (9*C0*x - 6*C0 - 15*x**5 + 60*x**4 - 94*x**3 + 72*x**2 \ + - 30*x + 6)/(6*C0*x**2 - 9*C0*x + 3*C0 + 6*x**6 - 29*x**5 + \ + 57*x**4 - 58*x**3 + 30*x**2 - 6*x)), Eq(f(x), (3*x - 2)/(2*x**2 \ + - 3*x + 1))] + ), + # Regression: Poles with even multiplicity > 2 fixed + ( + f(x)**2 + f(x).diff(x) - (4*x**6 - 8*x**5 + 12*x**4 + 4*x**3 + \ + 7*x**2 - 20*x + 4)/(4*x**4), + [Eq(f(x), (2*x**5 - 2*x**4 - x**3 + 4*x**2 + 3*x - 2)/(2*x**4 \ + - 2*x**2))] + ), + # Regression: Poles with even multiplicity > 2 fixed + ( + Eq(f(x).diff(x), (-x**6 + 15*x**4 - 40*x**3 + 45*x**2 - 24*x + 4)/\ + (x**12 - 12*x**11 + 66*x**10 - 220*x**9 + 495*x**8 - 792*x**7 + 924*x**6 - \ + 792*x**5 + 495*x**4 - 220*x**3 + 66*x**2 - 12*x + 1) + f(x)**2 + f(x)), + [Eq(f(x), 1/(x**6 - 6*x**5 + 15*x**4 - 20*x**3 + 15*x**2 - 6*x + 1))] + ), + # More than 2 poles with multiplicity 2 + # Regression: Fixed mistake in necessary conditions + ( + Eq(f(x).diff(x), x*f(x) + 2*x + (3*x - 2)*f(x)**2/(4*x + 2) + \ + (8*x**2 - 7*x + 26)/(16*x**3 - 24*x**2 + 8) - S(3)/2), + [Eq(f(x), (1 - 4*x)/(2*x - 2))] + ), + # Regression: Fixed mistake in necessary conditions + ( + Eq(f(x).diff(x), (-12*x**2 - 48*x - 15)/(24*x**3 - 40*x**2 + 8*x + 8) \ + + 3*f(x)**2/(6*x + 2)), + [Eq(f(x), (2*x + 1)/(2*x - 2))] + ), + # Imaginary poles + ( + f(x).diff(x) + (3*x**2 + 1)*f(x)**2/x + (6*x**2 - x + 3)*f(x)/(x*(x \ + - 1)) + (3*x**2 - 2*x + 2)/(x*(x - 1)**2), + [Eq(f(x), (-C0 - x**3 + x**2 - 2*x)/(C0*x - C0 + x**4 - x**3 + x**2 \ + - x)), Eq(f(x), -1/(x - 1))], + ), + # Imaginary coefficients in equation + ( + f(x).diff(x) - 2*I*(f(x)**2 + 1)/x, + [Eq(f(x), (-I*C0 + I*x**4)/(C0 + x**4)), Eq(f(x), -I)] + ), + # Regression: linsolve returning empty solution + # Large value of m (> 10) + ( + Eq(f(x).diff(x), x*f(x)/(S(3)/2 - 2*x) + (x/2 - S(1)/3)*f(x)**2/\ + (2*x/3 - S(1)/2) - S(5)/4 + (281*x**2 - 1260*x + 756)/(16*x**3 - 12*x**2)), + [Eq(f(x), (9 - x)/x), Eq(f(x), (40*x**14 + 28*x**13 + 420*x**12 + 2940*x**11 + \ + 18480*x**10 + 103950*x**9 + 519750*x**8 + 2286900*x**7 + 8731800*x**6 + 28378350*\ + x**5 + 76403250*x**4 + 163721250*x**3 + 261954000*x**2 + 278326125*x + 147349125)/\ + ((24*x**14 + 140*x**13 + 840*x**12 + 4620*x**11 + 23100*x**10 + 103950*x**9 + \ + 415800*x**8 + 1455300*x**7 + 4365900*x**6 + 10914750*x**5 + 21829500*x**4 + 32744250\ + *x**3 + 32744250*x**2 + 16372125*x)))] + ), + # Regression: Fixed bug due to a typo in paper + ( + Eq(f(x).diff(x), 18*x**3 + 18*x**2 + (-x/2 - S(1)/2)*f(x)**2 + 6), + [Eq(f(x), 6*x)] + ), + # Regression: Fixed bug due to a typo in paper + ( + Eq(f(x).diff(x), -3*x**3/4 + 15*x/2 + (x/3 - S(4)/3)*f(x)**2 \ + + 9 + (1 - x)*f(x)/x + 3/x), + [Eq(f(x), -3*x/2 - 3)] + )] + for eq, sol in tests: + check_dummy_sol(eq, sol, C0) + + +@slow +def test_solve_riccati_slow(): + """ + This function tests the computation of rational + particular solutions for a Riccati ODE. + + Each test case has 2 values - + + 1. eq - Riccati ODE to be solved. + 2. sol - Expected solution to the equation. + """ + C0 = Dummy('C0') + tests = [ + # Very large values of m (989 and 991) + ( + Eq(f(x).diff(x), (1 - x)*f(x)/(x - 3) + (2 - 12*x)*f(x)**2/(2*x - 9) + \ + (54924*x**3 - 405264*x**2 + 1084347*x - 1087533)/(8*x**4 - 132*x**3 + 810*x**2 - \ + 2187*x + 2187) + 495), + [Eq(f(x), (18*x + 6)/(2*x - 9))] + )] + for eq, sol in tests: + check_dummy_sol(eq, sol, C0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_single.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_single.py new file mode 100644 index 0000000000000000000000000000000000000000..45b38029e97b9e74236c45f2f3efb6aa87c26e5c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_single.py @@ -0,0 +1,2902 @@ +# +# The main tests for the code in single.py are currently located in +# sympy/solvers/tests/test_ode.py +# +r""" +This File contains test functions for the individual hints used for solving ODEs. + +Examples of each solver will be returned by _get_examples_ode_sol_name_of_solver. + +Examples should have a key 'XFAIL' which stores the list of hints if they are +expected to fail for that hint. + +Functions that are for internal use: + +1) _ode_solver_test(ode_examples) - It takes a dictionary of examples returned by + _get_examples method and tests them with their respective hints. + +2) _test_particular_example(our_hint, example_name) - It tests the ODE example corresponding + to the hint provided. + +3) _test_all_hints(runxfail=False) - It is used to test all the examples with all the hints + currently implemented. It calls _test_all_examples_for_one_hint() which outputs whether the + given hint functions properly if it classifies the ODE example. + If runxfail flag is set to True then it will only test the examples which are expected to fail. + + Everytime the ODE of a particular solver is added, _test_all_hints() is to be executed to find + the possible failures of different solver hints. + +4) _test_all_examples_for_one_hint(our_hint, all_examples) - It takes hint as argument and checks + this hint against all the ODE examples and gives output as the number of ODEs matched, number + of ODEs which were solved correctly, list of ODEs which gives incorrect solution and list of + ODEs which raises exception. + +""" +from sympy.core.function import (Derivative, diff) +from sympy.core.mul import Mul +from sympy.core.numbers import (E, I, Rational, pi) +from sympy.core.relational import (Eq, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import (LambertW, exp, log) +from sympy.functions.elementary.hyperbolic import (asinh, cosh, sinh, tanh) +from sympy.functions.elementary.miscellaneous import (cbrt, sqrt) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acos, asin, atan, cos, sec, sin, tan) +from sympy.functions.special.error_functions import (Ei, erfi) +from sympy.functions.special.hyper import hyper +from sympy.integrals.integrals import (Integral, integrate) +from sympy.polys.rootoftools import rootof + +from sympy.core import Function, Symbol +from sympy.functions import airyai, airybi, besselj, bessely, lowergamma +from sympy.integrals.risch import NonElementaryIntegral +from sympy.solvers.ode import classify_ode, dsolve +from sympy.solvers.ode.ode import allhints, _remove_redundant_solutions +from sympy.solvers.ode.single import (FirstLinear, ODEMatchError, + SingleODEProblem, SingleODESolver, NthOrderReducible) + +from sympy.solvers.ode.subscheck import checkodesol + +from sympy.testing.pytest import raises, slow +import traceback + + +x = Symbol('x') +u = Symbol('u') +_u = Dummy('u') +y = Symbol('y') +f = Function('f') +g = Function('g') +C1, C2, C3, C4, C5, C6, C7, C8, C9, C10 = symbols('C1:11') +a, b, c = symbols('a b c') + + +hint_message = """\ +Hint did not match the example {example}. + +The ODE is: +{eq}. + +The expected hint was +{our_hint}\ +""" + +expected_sol_message = """\ +Different solution found from dsolve for example {example}. + +The ODE is: +{eq} + +The expected solution was +{sol} + +What dsolve returned is: +{dsolve_sol}\ +""" + +checkodesol_msg = """\ +solution found is not correct for example {example}. + +The ODE is: +{eq}\ +""" + +dsol_incorrect_msg = """\ +solution returned by dsolve is incorrect when using {hint}. + +The ODE is: +{eq} + +The expected solution was +{sol} + +what dsolve returned is: +{dsolve_sol} + +You can test this with: + +eq = {eq} +sol = dsolve(eq, hint='{hint}') +print(sol) +print(checkodesol(eq, sol)) + +""" + +exception_msg = """\ +dsolve raised exception : {e} + +when using {hint} for the example {example} + +You can test this with: + +from sympy.solvers.ode.tests.test_single import _test_an_example + +_test_an_example('{hint}', example_name = '{example}') + +The ODE is: +{eq} + +\ +""" + +check_hint_msg = """\ +Tested hint was : {hint} + +Total of {matched} examples matched with this hint. + +Out of which {solve} gave correct results. + +Examples which gave incorrect results are {unsolve}. + +Examples which raised exceptions are {exceptions} +\ +""" + + +def _add_example_keys(func): + def inner(): + solver=func() + examples=[] + for example in solver['examples']: + temp={ + 'eq': solver['examples'][example]['eq'], + 'sol': solver['examples'][example]['sol'], + 'XFAIL': solver['examples'][example].get('XFAIL', []), + 'func': solver['examples'][example].get('func',solver['func']), + 'example_name': example, + 'slow': solver['examples'][example].get('slow', False), + 'simplify_flag':solver['examples'][example].get('simplify_flag',True), + 'checkodesol_XFAIL': solver['examples'][example].get('checkodesol_XFAIL', False), + 'dsolve_too_slow':solver['examples'][example].get('dsolve_too_slow',False), + 'checkodesol_too_slow':solver['examples'][example].get('checkodesol_too_slow',False), + 'hint': solver['hint'] + } + examples.append(temp) + return examples + return inner() + + +def _ode_solver_test(ode_examples, run_slow_test=False): + for example in ode_examples: + if ((not run_slow_test) and example['slow']) or (run_slow_test and (not example['slow'])): + continue + + result = _test_particular_example(example['hint'], example, solver_flag=True) + if result['xpass_msg'] != "": + print(result['xpass_msg']) + + +def _test_all_hints(runxfail=False): + all_hints = list(allhints)+["default"] + all_examples = _get_all_examples() + + for our_hint in all_hints: + if our_hint.endswith('_Integral') or 'series' in our_hint: + continue + _test_all_examples_for_one_hint(our_hint, all_examples, runxfail) + + +def _test_dummy_sol(expected_sol,dsolve_sol): + if type(dsolve_sol)==list: + return any(expected_sol.dummy_eq(sub_dsol) for sub_dsol in dsolve_sol) + else: + return expected_sol.dummy_eq(dsolve_sol) + + +def _test_an_example(our_hint, example_name): + all_examples = _get_all_examples() + for example in all_examples: + if example['example_name'] == example_name: + _test_particular_example(our_hint, example) + + +def _test_particular_example(our_hint, ode_example, solver_flag=False): + eq = ode_example['eq'] + expected_sol = ode_example['sol'] + example = ode_example['example_name'] + xfail = our_hint in ode_example['XFAIL'] + func = ode_example['func'] + result = {'msg': '', 'xpass_msg': ''} + simplify_flag=ode_example['simplify_flag'] + checkodesol_XFAIL = ode_example['checkodesol_XFAIL'] + dsolve_too_slow = ode_example['dsolve_too_slow'] + checkodesol_too_slow = ode_example['checkodesol_too_slow'] + xpass = True + if solver_flag: + if our_hint not in classify_ode(eq, func): + message = hint_message.format(example=example, eq=eq, our_hint=our_hint) + raise AssertionError(message) + + if our_hint in classify_ode(eq, func): + result['match_list'] = example + try: + if not (dsolve_too_slow): + dsolve_sol = dsolve(eq, func, simplify=simplify_flag,hint=our_hint) + else: + if len(expected_sol)==1: + dsolve_sol = expected_sol[0] + else: + dsolve_sol = expected_sol + + except Exception as e: + dsolve_sol = [] + result['exception_list'] = example + if not solver_flag: + traceback.print_exc() + result['msg'] = exception_msg.format(e=str(e), hint=our_hint, example=example, eq=eq) + if solver_flag and not xfail: + print(result['msg']) + raise + xpass = False + + if solver_flag and dsolve_sol!=[]: + expect_sol_check = False + if type(dsolve_sol)==list: + for sub_sol in expected_sol: + if sub_sol.has(Dummy): + expect_sol_check = not _test_dummy_sol(sub_sol, dsolve_sol) + else: + expect_sol_check = sub_sol not in dsolve_sol + if expect_sol_check: + break + else: + expect_sol_check = dsolve_sol not in expected_sol + for sub_sol in expected_sol: + if sub_sol.has(Dummy): + expect_sol_check = not _test_dummy_sol(sub_sol, dsolve_sol) + + if expect_sol_check: + message = expected_sol_message.format(example=example, eq=eq, sol=expected_sol, dsolve_sol=dsolve_sol) + raise AssertionError(message) + + expected_checkodesol = [(True, 0) for i in range(len(expected_sol))] + if len(expected_sol) == 1: + expected_checkodesol = (True, 0) + + if not checkodesol_too_slow: + if not checkodesol_XFAIL: + if checkodesol(eq, dsolve_sol, func, solve_for_func=False) != expected_checkodesol: + result['unsolve_list'] = example + xpass = False + message = dsol_incorrect_msg.format(hint=our_hint, eq=eq, sol=expected_sol,dsolve_sol=dsolve_sol) + if solver_flag: + message = checkodesol_msg.format(example=example, eq=eq) + raise AssertionError(message) + else: + result['msg'] = 'AssertionError: ' + message + + if xpass and xfail: + result['xpass_msg'] = example + "is now passing for the hint" + our_hint + return result + + +def _test_all_examples_for_one_hint(our_hint, all_examples=[], runxfail=None): + if all_examples == []: + all_examples = _get_all_examples() + match_list, unsolve_list, exception_list = [], [], [] + for ode_example in all_examples: + xfail = our_hint in ode_example['XFAIL'] + if runxfail and not xfail: + continue + if xfail: + continue + result = _test_particular_example(our_hint, ode_example) + match_list += result.get('match_list',[]) + unsolve_list += result.get('unsolve_list',[]) + exception_list += result.get('exception_list',[]) + if runxfail is not None: + msg = result['msg'] + if msg!='': + print(result['msg']) + # print(result.get('xpass_msg','')) + if runxfail is None: + match_count = len(match_list) + solved = len(match_list)-len(unsolve_list)-len(exception_list) + msg = check_hint_msg.format(hint=our_hint, matched=match_count, solve=solved, unsolve=unsolve_list, exceptions=exception_list) + print(msg) + + +def test_SingleODESolver(): + # Test that not implemented methods give NotImplementedError + # Subclasses should override these methods. + problem = SingleODEProblem(f(x).diff(x), f(x), x) + solver = SingleODESolver(problem) + raises(NotImplementedError, lambda: solver.matches()) + raises(NotImplementedError, lambda: solver.get_general_solution()) + raises(NotImplementedError, lambda: solver._matches()) + raises(NotImplementedError, lambda: solver._get_general_solution()) + + # This ODE can not be solved by the FirstLinear solver. Here we test that + # it does not match and the asking for a general solution gives + # ODEMatchError + + problem = SingleODEProblem(f(x).diff(x) + f(x)*f(x), f(x), x) + + solver = FirstLinear(problem) + raises(ODEMatchError, lambda: solver.get_general_solution()) + + solver = FirstLinear(problem) + assert solver.matches() is False + + #These are just test for order of ODE + + problem = SingleODEProblem(f(x).diff(x) + f(x), f(x), x) + assert problem.order == 1 + + problem = SingleODEProblem(f(x).diff(x,4) + f(x).diff(x,2) - f(x).diff(x,3), f(x), x) + assert problem.order == 4 + + problem = SingleODEProblem(f(x).diff(x, 3) + f(x).diff(x, 2) - f(x)**2, f(x), x) + assert problem.is_autonomous == True + + problem = SingleODEProblem(f(x).diff(x, 3) + x*f(x).diff(x, 2) - f(x)**2, f(x), x) + assert problem.is_autonomous == False + + +def test_linear_coefficients(): + _ode_solver_test(_get_examples_ode_sol_linear_coefficients) + + +@slow +def test_1st_homogeneous_coeff_ode(): + #These were marked as test_1st_homogeneous_coeff_corner_case + eq1 = f(x).diff(x) - f(x)/x + c1 = classify_ode(eq1, f(x)) + eq2 = x*f(x).diff(x) - f(x) + c2 = classify_ode(eq2, f(x)) + sdi = "1st_homogeneous_coeff_subs_dep_div_indep" + sid = "1st_homogeneous_coeff_subs_indep_div_dep" + assert sid not in c1 and sdi not in c1 + assert sid not in c2 and sdi not in c2 + _ode_solver_test(_get_examples_ode_sol_1st_homogeneous_coeff_subs_dep_div_indep) + _ode_solver_test(_get_examples_ode_sol_1st_homogeneous_coeff_best) + + +@slow +def test_slow_examples_1st_homogeneous_coeff_ode(): + _ode_solver_test(_get_examples_ode_sol_1st_homogeneous_coeff_subs_dep_div_indep, run_slow_test=True) + _ode_solver_test(_get_examples_ode_sol_1st_homogeneous_coeff_best, run_slow_test=True) + + +@slow +def test_nth_linear_constant_coeff_homogeneous(): + _ode_solver_test(_get_examples_ode_sol_nth_linear_constant_coeff_homogeneous) + + +@slow +def test_slow_examples_nth_linear_constant_coeff_homogeneous(): + _ode_solver_test(_get_examples_ode_sol_nth_linear_constant_coeff_homogeneous, run_slow_test=True) + + +def test_Airy_equation(): + _ode_solver_test(_get_examples_ode_sol_2nd_linear_airy) + + +@slow +def test_lie_group(): + _ode_solver_test(_get_examples_ode_sol_lie_group) + + +@slow +def test_separable_reduced(): + df = f(x).diff(x) + eq = (x / f(x))*df + tan(x**2*f(x) / (x**2*f(x) - 1)) + assert classify_ode(eq) == ('factorable', 'separable_reduced', 'lie_group', + 'separable_reduced_Integral') + _ode_solver_test(_get_examples_ode_sol_separable_reduced) + + +@slow +def test_slow_examples_separable_reduced(): + _ode_solver_test(_get_examples_ode_sol_separable_reduced, run_slow_test=True) + + +@slow +def test_2nd_2F1_hypergeometric(): + _ode_solver_test(_get_examples_ode_sol_2nd_2F1_hypergeometric) + + +def test_2nd_2F1_hypergeometric_integral(): + eq = x*(x-1)*f(x).diff(x, 2) + (-1+ S(7)/2*x)*f(x).diff(x) + f(x) + sol = Eq(f(x), (C1 + C2*Integral(exp(Integral((1 - x/2)/(x*(x - 1)), x))/(1 - + x/2)**2, x))*exp(Integral(1/(x - 1), x)/4)*exp(-Integral(7/(x - + 1), x)/4)*hyper((S(1)/2, -1), (1,), x)) + assert sol == dsolve(eq, hint='2nd_hypergeometric_Integral') + assert checkodesol(eq, sol) == (True, 0) + + +@slow +def test_2nd_nonlinear_autonomous_conserved(): + _ode_solver_test(_get_examples_ode_sol_2nd_nonlinear_autonomous_conserved) + + +def test_2nd_nonlinear_autonomous_conserved_integral(): + eq = f(x).diff(x, 2) + asin(f(x)) + actual = [Eq(Integral(1/sqrt(C1 - 2*Integral(asin(_u), _u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 - 2*Integral(asin(_u), _u)), (_u, f(x))), C2 - x)] + solved = dsolve(eq, hint='2nd_nonlinear_autonomous_conserved_Integral', simplify=False) + for a,s in zip(actual, solved): + assert a.dummy_eq(s) + # checkodesol unable to simplify solutions with f(x) in an integral equation + assert checkodesol(eq, [s.doit() for s in solved]) == [(True, 0), (True, 0)] + + +@slow +def test_2nd_linear_bessel_equation(): + _ode_solver_test(_get_examples_ode_sol_2nd_linear_bessel) + + +@slow +def test_nth_algebraic(): + eqn = f(x) + f(x)*f(x).diff(x) + solns = [Eq(f(x), exp(x)), + Eq(f(x), C1*exp(C2*x))] + solns_final = _remove_redundant_solutions(eqn, solns, 2, x) + assert solns_final == [Eq(f(x), C1*exp(C2*x))] + + _ode_solver_test(_get_examples_ode_sol_nth_algebraic) + + +@slow +def test_slow_examples_nth_linear_constant_coeff_var_of_parameters(): + _ode_solver_test(_get_examples_ode_sol_nth_linear_var_of_parameters, run_slow_test=True) + + +def test_nth_linear_constant_coeff_var_of_parameters(): + _ode_solver_test(_get_examples_ode_sol_nth_linear_var_of_parameters) + + +@slow +def test_nth_linear_constant_coeff_variation_of_parameters__integral(): + # solve_variation_of_parameters shouldn't attempt to simplify the + # Wronskian if simplify=False. If wronskian() ever gets good enough + # to simplify the result itself, this test might fail. + our_hint = 'nth_linear_constant_coeff_variation_of_parameters_Integral' + eq = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x) + sol_simp = dsolve(eq, f(x), hint=our_hint, simplify=True) + sol_nsimp = dsolve(eq, f(x), hint=our_hint, simplify=False) + assert sol_simp != sol_nsimp + assert checkodesol(eq, sol_simp, order=5, solve_for_func=False) == (True, 0) + assert checkodesol(eq, sol_simp, order=5, solve_for_func=False) == (True, 0) + + +@slow +def test_slow_examples_1st_exact(): + _ode_solver_test(_get_examples_ode_sol_1st_exact, run_slow_test=True) + + +@slow +def test_1st_exact(): + _ode_solver_test(_get_examples_ode_sol_1st_exact) + + +def test_1st_exact_integral(): + eq = cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x) + sol_1 = dsolve(eq, f(x), simplify=False, hint='1st_exact_Integral') + assert checkodesol(eq, sol_1, order=1, solve_for_func=False) + + +@slow +def test_slow_examples_nth_order_reducible(): + _ode_solver_test(_get_examples_ode_sol_nth_order_reducible, run_slow_test=True) + + +@slow +def test_slow_examples_nth_linear_constant_coeff_undetermined_coefficients(): + _ode_solver_test(_get_examples_ode_sol_nth_linear_undetermined_coefficients, run_slow_test=True) + + +@slow +def test_slow_examples_separable(): + _ode_solver_test(_get_examples_ode_sol_separable, run_slow_test=True) + + +@slow +def test_nth_linear_constant_coeff_undetermined_coefficients(): + #issue-https://github.com/sympy/sympy/issues/5787 + # This test case is to show the classification of imaginary constants under + # nth_linear_constant_coeff_undetermined_coefficients + eq = Eq(diff(f(x), x), I*f(x) + S.Half - I) + our_hint = 'nth_linear_constant_coeff_undetermined_coefficients' + assert our_hint in classify_ode(eq) + _ode_solver_test(_get_examples_ode_sol_nth_linear_undetermined_coefficients) + + +def test_nth_order_reducible(): + F = lambda eq: NthOrderReducible(SingleODEProblem(eq, f(x), x))._matches() + D = Derivative + assert F(D(y*f(x), x, y) + D(f(x), x)) == False + assert F(D(y*f(y), y, y) + D(f(y), y)) == False + assert F(f(x)*D(f(x), x) + D(f(x), x, 2))== False + assert F(D(x*f(y), y, 2) + D(u*y*f(x), x, 3)) == False # no simplification by design + assert F(D(f(y), y, 2) + D(f(y), y, 3) + D(f(x), x, 4)) == False + assert F(D(f(x), x, 2) + D(f(x), x, 3)) == True + _ode_solver_test(_get_examples_ode_sol_nth_order_reducible) + + +@slow +def test_separable(): + _ode_solver_test(_get_examples_ode_sol_separable) + + +@slow +def test_factorable(): + assert integrate(-asin(f(2*x)+pi), x) == -Integral(asin(pi + f(2*x)), x) + _ode_solver_test(_get_examples_ode_sol_factorable) + + +@slow +def test_slow_examples_factorable(): + _ode_solver_test(_get_examples_ode_sol_factorable, run_slow_test=True) + + +def test_Riccati_special_minus2(): + _ode_solver_test(_get_examples_ode_sol_riccati) + + +@slow +def test_1st_rational_riccati(): + _ode_solver_test(_get_examples_ode_sol_1st_rational_riccati) + + +def test_Bernoulli(): + _ode_solver_test(_get_examples_ode_sol_bernoulli) + + +def test_1st_linear(): + _ode_solver_test(_get_examples_ode_sol_1st_linear) + + +def test_almost_linear(): + _ode_solver_test(_get_examples_ode_sol_almost_linear) + + +@slow +def test_Liouville_ODE(): + hint = 'Liouville' + not_Liouville1 = classify_ode(diff(f(x), x)/x + f(x)*diff(f(x), x, x)/2 - + diff(f(x), x)**2/2, f(x)) + not_Liouville2 = classify_ode(diff(f(x), x)/x + diff(f(x), x, x)/2 - + x*diff(f(x), x)**2/2, f(x)) + assert hint not in not_Liouville1 + assert hint not in not_Liouville2 + assert hint + '_Integral' not in not_Liouville1 + assert hint + '_Integral' not in not_Liouville2 + + _ode_solver_test(_get_examples_ode_sol_liouville) + + +def test_nth_order_linear_euler_eq_homogeneous(): + x, t, a, b, c = symbols('x t a b c') + y = Function('y') + our_hint = "nth_linear_euler_eq_homogeneous" + + eq = diff(f(t), t, 4)*t**4 - 13*diff(f(t), t, 2)*t**2 + 36*f(t) + assert our_hint in classify_ode(eq) + + eq = a*y(t) + b*t*diff(y(t), t) + c*t**2*diff(y(t), t, 2) + assert our_hint in classify_ode(eq) + + _ode_solver_test(_get_examples_ode_sol_euler_homogeneous) + + +def test_nth_order_linear_euler_eq_nonhomogeneous_undetermined_coefficients(): + x, t = symbols('x t') + a, b, c, d = symbols('a b c d', integer=True) + our_hint = "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients" + + eq = x**4*diff(f(x), x, 4) - 13*x**2*diff(f(x), x, 2) + 36*f(x) + x + assert our_hint in classify_ode(eq, f(x)) + + eq = a*x**2*diff(f(x), x, 2) + b*x*diff(f(x), x) + c*f(x) + d*log(x) + assert our_hint in classify_ode(eq, f(x)) + + _ode_solver_test(_get_examples_ode_sol_euler_undetermined_coeff) + + +@slow +def test_nth_order_linear_euler_eq_nonhomogeneous_variation_of_parameters(): + x, t = symbols('x, t') + a, b, c, d = symbols('a, b, c, d', integer=True) + our_hint = "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters" + + eq = Eq(x**2*diff(f(x),x,2) - 8*x*diff(f(x),x) + 12*f(x), x**2) + assert our_hint in classify_ode(eq, f(x)) + + eq = Eq(a*x**3*diff(f(x),x,3) + b*x**2*diff(f(x),x,2) + c*x*diff(f(x),x) + d*f(x), x*log(x)) + assert our_hint in classify_ode(eq, f(x)) + + _ode_solver_test(_get_examples_ode_sol_euler_var_para) + + +@_add_example_keys +def _get_examples_ode_sol_euler_homogeneous(): + r1, r2, r3, r4, r5 = [rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, n) for n in range(5)] + return { + 'hint': "nth_linear_euler_eq_homogeneous", + 'func': f(x), + 'examples':{ + 'euler_hom_01': { + 'eq': Eq(-3*diff(f(x), x)*x + 2*x**2*diff(f(x), x, x), 0), + 'sol': [Eq(f(x), C1 + C2*x**Rational(5, 2))], + }, + + 'euler_hom_02': { + 'eq': Eq(3*f(x) - 5*diff(f(x), x)*x + 2*x**2*diff(f(x), x, x), 0), + 'sol': [Eq(f(x), C1*sqrt(x) + C2*x**3)] + }, + + 'euler_hom_03': { + 'eq': Eq(4*f(x) + 5*diff(f(x), x)*x + x**2*diff(f(x), x, x), 0), + 'sol': [Eq(f(x), (C1 + C2*log(x))/x**2)] + }, + + 'euler_hom_04': { + 'eq': Eq(6*f(x) - 6*diff(f(x), x)*x + 1*x**2*diff(f(x), x, x) + x**3*diff(f(x), x, x, x), 0), + 'sol': [Eq(f(x), C1/x**2 + C2*x + C3*x**3)] + }, + + 'euler_hom_05': { + 'eq': Eq(-125*f(x) + 61*diff(f(x), x)*x - 12*x**2*diff(f(x), x, x) + x**3*diff(f(x), x, x, x), 0), + 'sol': [Eq(f(x), x**5*(C1 + C2*log(x) + C3*log(x)**2))] + }, + + 'euler_hom_06': { + 'eq': x**2*diff(f(x), x, 2) + x*diff(f(x), x) - 9*f(x), + 'sol': [Eq(f(x), C1*x**-3 + C2*x**3)] + }, + + 'euler_hom_07': { + 'eq': sin(x)*x**2*f(x).diff(x, 2) + sin(x)*x*f(x).diff(x) + sin(x)*f(x), + 'sol': [Eq(f(x), C1*sin(log(x)) + C2*cos(log(x)))], + 'XFAIL': ['2nd_power_series_regular','nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients'] + }, + + 'euler_hom_08': { + 'eq': x**6 * f(x).diff(x, 6) - x*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), C1*x + C2*x**r1 + C3*x**r2 + C4*x**r3 + C5*x**r4 + C6*x**r5)], + 'checkodesol_XFAIL':True + }, + + #This example is from issue: https://github.com/sympy/sympy/issues/15237 #This example is from issue: + # https://github.com/sympy/sympy/issues/15237 + 'euler_hom_09': { + 'eq': Derivative(x*f(x), x, x, x), + 'sol': [Eq(f(x), C1 + C2/x + C3*x)], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_euler_undetermined_coeff(): + return { + 'hint': "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients", + 'func': f(x), + 'examples':{ + 'euler_undet_01': { + 'eq': Eq(x**2*diff(f(x), x, x) + x*diff(f(x), x), 1), + 'sol': [Eq(f(x), C1 + C2*log(x) + log(x)**2/2)] + }, + + 'euler_undet_02': { + 'eq': Eq(x**2*diff(f(x), x, x) - 2*x*diff(f(x), x) + 2*f(x), x**3), + 'sol': [Eq(f(x), x*(C1 + C2*x + Rational(1, 2)*x**2))] + }, + + 'euler_undet_03': { + 'eq': Eq(x**2*diff(f(x), x, x) - x*diff(f(x), x) - 3*f(x), log(x)/x), + 'sol': [Eq(f(x), (C1 + C2*x**4 - log(x)**2/8 - log(x)/16)/x)] + }, + + 'euler_undet_04': { + 'eq': Eq(x**2*diff(f(x), x, x) + 3*x*diff(f(x), x) - 8*f(x), log(x)**3 - log(x)), + 'sol': [Eq(f(x), C1/x**4 + C2*x**2 - Rational(1,8)*log(x)**3 - Rational(3,32)*log(x)**2 - Rational(1,64)*log(x) - Rational(7, 256))] + }, + + 'euler_undet_05': { + 'eq': Eq(x**3*diff(f(x), x, x, x) - 3*x**2*diff(f(x), x, x) + 6*x*diff(f(x), x) - 6*f(x), log(x)), + 'sol': [Eq(f(x), C1*x + C2*x**2 + C3*x**3 - Rational(1, 6)*log(x) - Rational(11, 36))] + }, + + #Below examples were added for the issue: https://github.com/sympy/sympy/issues/5096 + 'euler_undet_06': { + 'eq': 2*x**2*f(x).diff(x, 2) + f(x) + sqrt(2*x)*sin(log(2*x)/2), + 'sol': [Eq(f(x), sqrt(x)*(C1*sin(log(x)/2) + C2*cos(log(x)/2) + sqrt(2)*log(x)*cos(log(2*x)/2)/2))] + }, + + 'euler_undet_07': { + 'eq': 2*x**2*f(x).diff(x, 2) + f(x) + sin(log(2*x)/2), + 'sol': [Eq(f(x), C1*sqrt(x)*sin(log(x)/2) + C2*sqrt(x)*cos(log(x)/2) - 2*sin(log(2*x)/2)/5 - 4*cos(log(2*x)/2)/5)] + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_euler_var_para(): + return { + 'hint': "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters", + 'func': f(x), + 'examples':{ + 'euler_var_01': { + 'eq': Eq(x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x), x**4), + 'sol': [Eq(f(x), x*(C1 + C2*x + x**3/6))] + }, + + 'euler_var_02': { + 'eq': Eq(3*x**2*diff(f(x), x, x) + 6*x*diff(f(x), x) - 6*f(x), x**3*exp(x)), + 'sol': [Eq(f(x), C1/x**2 + C2*x + x*exp(x)/3 - 4*exp(x)/3 + 8*exp(x)/(3*x) - 8*exp(x)/(3*x**2))] + }, + + 'euler_var_03': { + 'eq': Eq(x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x), x**4*exp(x)), + 'sol': [Eq(f(x), x*(C1 + C2*x + x*exp(x) - 2*exp(x)))] + }, + + 'euler_var_04': { + 'eq': x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - log(x), + 'sol': [Eq(f(x), C1*x + C2*x**2 + log(x)/2 + Rational(3, 4))] + }, + + 'euler_var_05': { + 'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x, + 'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))] + }, + + 'euler_var_06': { + 'eq': x**2 * f(x).diff(x, 2) + x * f(x).diff(x) + 4 * f(x) - 1/x, + 'sol': [Eq(f(x), C1*sin(2*log(x)) + C2*cos(2*log(x)) + 1/(5*x))] + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_bernoulli(): + # Type: Bernoulli, f'(x) + p(x)*f(x) == q(x)*f(x)**n + return { + 'hint': "Bernoulli", + 'func': f(x), + 'examples':{ + 'bernoulli_01': { + 'eq': Eq(x*f(x).diff(x) + f(x) - f(x)**2, 0), + 'sol': [Eq(f(x), 1/(C1*x + 1))], + 'XFAIL': ['separable_reduced'] + }, + + 'bernoulli_02': { + 'eq': f(x).diff(x) - y*f(x), + 'sol': [Eq(f(x), C1*exp(x*y))] + }, + + 'bernoulli_03': { + 'eq': f(x)*f(x).diff(x) - 1, + 'sol': [Eq(f(x), -sqrt(C1 + 2*x)), Eq(f(x), sqrt(C1 + 2*x))] + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_riccati(): + # Type: Riccati special alpha = -2, a*dy/dx + b*y**2 + c*y/x +d/x**2 + return { + 'hint': "Riccati_special_minus2", + 'func': f(x), + 'examples':{ + 'riccati_01': { + 'eq': 2*f(x).diff(x) + f(x)**2 - f(x)/x + 3*x**(-2), + 'sol': [Eq(f(x), (-sqrt(3)*tan(C1 + sqrt(3)*log(x)/4) + 3)/(2*x))], + }, + }, + } + + +@_add_example_keys +def _get_examples_ode_sol_1st_rational_riccati(): + # Type: 1st Order Rational Riccati, dy/dx = a + b*y + c*y**2, + # a, b, c are rational functions of x + return { + 'hint': "1st_rational_riccati", + 'func': f(x), + 'examples':{ + # a(x) is a constant + "rational_riccati_01": { + "eq": Eq(f(x).diff(x) + f(x)**2 - 2, 0), + "sol": [Eq(f(x), sqrt(2)*(-C1 - exp(2*sqrt(2)*x))/(C1 - exp(2*sqrt(2)*x)))] + }, + # a(x) is a constant + "rational_riccati_02": { + "eq": f(x)**2 + Derivative(f(x), x) + 4*f(x)/x + 2/x**2, + "sol": [Eq(f(x), (-2*C1 - x)/(x*(C1 + x)))] + }, + # a(x) is a constant + "rational_riccati_03": { + "eq": 2*x**2*Derivative(f(x), x) - x*(4*f(x) + Derivative(f(x), x) - 4) + (f(x) - 1)*f(x), + "sol": [Eq(f(x), (C1 + 2*x**2)/(C1 + x))] + }, + # Constant coefficients + "rational_riccati_04": { + "eq": f(x).diff(x) - 6 - 5*f(x) - f(x)**2, + "sol": [Eq(f(x), (-2*C1 + 3*exp(x))/(C1 - exp(x)))] + }, + # One pole of multiplicity 2 + "rational_riccati_05": { + "eq": x**2 - (2*x + 1/x)*f(x) + f(x)**2 + Derivative(f(x), x), + "sol": [Eq(f(x), x*(C1 + x**2 + 1)/(C1 + x**2 - 1))] + }, + # One pole of multiplicity 2 + "rational_riccati_06": { + "eq": x**4*Derivative(f(x), x) + x**2 - x*(2*f(x)**2 + Derivative(f(x), x)) + f(x), + "sol": [Eq(f(x), x*(C1*x - x + 1)/(C1 + x**2 - 1))] + }, + # Multiple poles of multiplicity 2 + "rational_riccati_07": { + "eq": -f(x)**2 + Derivative(f(x), x) + (15*x**2 - 20*x + 7)/((x - 1)**2*(2*x \ + - 1)**2), + "sol": [Eq(f(x), (9*C1*x - 6*C1 - 15*x**5 + 60*x**4 - 94*x**3 + 72*x**2 - \ + 33*x + 8)/(6*C1*x**2 - 9*C1*x + 3*C1 + 6*x**6 - 29*x**5 + 57*x**4 - \ + 58*x**3 + 28*x**2 - 3*x - 1))] + }, + # Imaginary poles + "rational_riccati_08": { + "eq": Derivative(f(x), x) + (3*x**2 + 1)*f(x)**2/x + (6*x**2 - x + 3)*f(x)/(x*(x \ + - 1)) + (3*x**2 - 2*x + 2)/(x*(x - 1)**2), + "sol": [Eq(f(x), (-C1 - x**3 + x**2 - 2*x + 1)/(C1*x - C1 + x**4 - x**3 + x**2 - \ + 2*x + 1))], + }, + # Imaginary coefficients in equation + "rational_riccati_09": { + "eq": Derivative(f(x), x) - 2*I*(f(x)**2 + 1)/x, + "sol": [Eq(f(x), (-I*C1 + I*x**4 + I)/(C1 + x**4 - 1))] + }, + # Regression: linsolve returning empty solution + # Large value of m (> 10) + "rational_riccati_10": { + "eq": Eq(Derivative(f(x), x), x*f(x)/(S(3)/2 - 2*x) + (x/2 - S(1)/3)*f(x)**2/\ + (2*x/3 - S(1)/2) - S(5)/4 + (281*x**2 - 1260*x + 756)/(16*x**3 - 12*x**2)), + "sol": [Eq(f(x), (40*C1*x**14 + 28*C1*x**13 + 420*C1*x**12 + 2940*C1*x**11 + \ + 18480*C1*x**10 + 103950*C1*x**9 + 519750*C1*x**8 + 2286900*C1*x**7 + \ + 8731800*C1*x**6 + 28378350*C1*x**5 + 76403250*C1*x**4 + 163721250*C1*x**3 \ + + 261954000*C1*x**2 + 278326125*C1*x + 147349125*C1 + x*exp(2*x) - 9*exp(2*x) \ + )/(x*(24*C1*x**13 + 140*C1*x**12 + 840*C1*x**11 + 4620*C1*x**10 + 23100*C1*x**9 \ + + 103950*C1*x**8 + 415800*C1*x**7 + 1455300*C1*x**6 + 4365900*C1*x**5 + \ + 10914750*C1*x**4 + 21829500*C1*x**3 + 32744250*C1*x**2 + 32744250*C1*x + \ + 16372125*C1 - exp(2*x))))] + } + } + } + + + +@_add_example_keys +def _get_examples_ode_sol_1st_linear(): + # Type: first order linear form f'(x)+p(x)f(x)=q(x) + return { + 'hint': "1st_linear", + 'func': f(x), + 'examples':{ + 'linear_01': { + 'eq': Eq(f(x).diff(x) + x*f(x), x**2), + 'sol': [Eq(f(x), (C1 + x*exp(x**2/2)- sqrt(2)*sqrt(pi)*erfi(sqrt(2)*x/2)/2)*exp(-x**2/2))], + }, + }, + } + + +@_add_example_keys +def _get_examples_ode_sol_factorable(): + """ some hints are marked as xfail for examples because they missed additional algebraic solution + which could be found by Factorable hint. Fact_01 raise exception for + nth_linear_constant_coeff_undetermined_coefficients""" + + y = Dummy('y') + a0,a1,a2,a3,a4 = symbols('a0, a1, a2, a3, a4') + return { + 'hint': "factorable", + 'func': f(x), + 'examples':{ + 'fact_01': { + 'eq': f(x) + f(x)*f(x).diff(x), + 'sol': [Eq(f(x), 0), Eq(f(x), C1 - x)], + 'XFAIL': ['separable', '1st_exact', '1st_linear', 'Bernoulli', '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep', + 'lie_group', 'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + 'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters', + 'nth_linear_constant_coeff_undetermined_coefficients'] + }, + + 'fact_02': { + 'eq': f(x)*(f(x).diff(x)+f(x)*x+2), + 'sol': [Eq(f(x), (C1 - sqrt(2)*sqrt(pi)*erfi(sqrt(2)*x/2))*exp(-x**2/2)), Eq(f(x), 0)], + 'XFAIL': ['Bernoulli', '1st_linear', 'lie_group'] + }, + + 'fact_03': { + 'eq': (f(x).diff(x)+f(x)*x**2)*(f(x).diff(x, 2) + x*f(x)), + 'sol': [Eq(f(x), C1*airyai(-x) + C2*airybi(-x)),Eq(f(x), C1*exp(-x**3/3))] + }, + + 'fact_04': { + 'eq': (f(x).diff(x)+f(x)*x**2)*(f(x).diff(x, 2) + f(x)), + 'sol': [Eq(f(x), C1*exp(-x**3/3)), Eq(f(x), C1*sin(x) + C2*cos(x))] + }, + + 'fact_05': { + 'eq': (f(x).diff(x)**2-1)*(f(x).diff(x)**2-4), + 'sol': [Eq(f(x), C1 - x), Eq(f(x), C1 + x), Eq(f(x), C1 + 2*x), Eq(f(x), C1 - 2*x)] + }, + + 'fact_06': { + 'eq': (f(x).diff(x, 2)-exp(f(x)))*f(x).diff(x), + 'sol': [ + Eq(f(x), log(-C1/(cos(sqrt(-C1)*(C2 + x)) + 1))), + Eq(f(x), log(-C1/(cos(sqrt(-C1)*(C2 - x)) + 1))), + Eq(f(x), C1) + ], + 'slow': True, + }, + + 'fact_07': { + 'eq': (f(x).diff(x)**2-1)*(f(x)*f(x).diff(x)-1), + 'sol': [Eq(f(x), C1 - x), Eq(f(x), -sqrt(C1 + 2*x)),Eq(f(x), sqrt(C1 + 2*x)), Eq(f(x), C1 + x)] + }, + + 'fact_08': { + 'eq': Derivative(f(x), x)**4 - 2*Derivative(f(x), x)**2 + 1, + 'sol': [Eq(f(x), C1 - x), Eq(f(x), C1 + x)] + }, + + 'fact_09': { + 'eq': f(x)**2*Derivative(f(x), x)**6 - 2*f(x)**2*Derivative(f(x), + x)**4 + f(x)**2*Derivative(f(x), x)**2 - 2*f(x)*Derivative(f(x), + x)**5 + 4*f(x)*Derivative(f(x), x)**3 - 2*f(x)*Derivative(f(x), + x) + Derivative(f(x), x)**4 - 2*Derivative(f(x), x)**2 + 1, + 'sol': [ + Eq(f(x), C1 - x), Eq(f(x), -sqrt(C1 + 2*x)), + Eq(f(x), sqrt(C1 + 2*x)), Eq(f(x), C1 + x) + ] + }, + + 'fact_10': { + 'eq': x**4*f(x)**2 + 2*x**4*f(x)*Derivative(f(x), (x, 2)) + x**4*Derivative(f(x), + (x, 2))**2 + 2*x**3*f(x)*Derivative(f(x), x) + 2*x**3*Derivative(f(x), + x)*Derivative(f(x), (x, 2)) - 7*x**2*f(x)**2 - 7*x**2*f(x)*Derivative(f(x), + (x, 2)) + x**2*Derivative(f(x), x)**2 - 7*x*f(x)*Derivative(f(x), x) + 12*f(x)**2, + 'sol': [ + Eq(f(x), C1*besselj(2, x) + C2*bessely(2, x)), + Eq(f(x), C1*besselj(sqrt(3), x) + C2*bessely(sqrt(3), x)) + ], + 'slow': True, + }, + + 'fact_11': { + 'eq': (f(x).diff(x, 2)-exp(f(x)))*(f(x).diff(x, 2)+exp(f(x))), + 'sol': [ + Eq(f(x), log(C1/(cos(C1*sqrt(-1/C1)*(C2 + x)) - 1))), + Eq(f(x), log(C1/(cos(C1*sqrt(-1/C1)*(C2 - x)) - 1))), + Eq(f(x), log(C1/(1 - cos(C1*sqrt(-1/C1)*(C2 + x))))), + Eq(f(x), log(C1/(1 - cos(C1*sqrt(-1/C1)*(C2 - x))))) + ], + 'dsolve_too_slow': True, + }, + + #Below examples were added for the issue: https://github.com/sympy/sympy/issues/15889 + 'fact_12': { + 'eq': exp(f(x).diff(x))-f(x)**2, + 'sol': [Eq(NonElementaryIntegral(1/log(y**2), (y, f(x))), C1 + x)], + 'XFAIL': ['lie_group'] #It shows not implemented error for lie_group. + }, + + 'fact_13': { + 'eq': f(x).diff(x)**2 - f(x)**3, + 'sol': [Eq(f(x), 4/(C1**2 - 2*C1*x + x**2))], + 'XFAIL': ['lie_group'] #It shows not implemented error for lie_group. + }, + + 'fact_14': { + 'eq': f(x).diff(x)**2 - f(x), + 'sol': [Eq(f(x), C1**2/4 - C1*x/2 + x**2/4)] + }, + + 'fact_15': { + 'eq': f(x).diff(x)**2 - f(x)**2, + 'sol': [Eq(f(x), C1*exp(x)), Eq(f(x), C1*exp(-x))] + }, + + 'fact_16': { + 'eq': f(x).diff(x)**2 - f(x)**3, + 'sol': [Eq(f(x), 4/(C1**2 - 2*C1*x + x**2))], + }, + + # kamke ode 1.1 + 'fact_17': { + 'eq': f(x).diff(x)-(a4*x**4 + a3*x**3 + a2*x**2 + a1*x + a0)**(-1/2), + 'sol': [Eq(f(x), C1 + Integral(1/sqrt(a0 + a1*x + a2*x**2 + a3*x**3 + a4*x**4), x))], + 'slow': True + }, + + # This is from issue: https://github.com/sympy/sympy/issues/9446 + 'fact_18':{ + 'eq': Eq(f(2 * x), sin(Derivative(f(x)))), + 'sol': [Eq(f(x), C1 + Integral(pi - asin(f(2*x)), x)), Eq(f(x), C1 + Integral(asin(f(2*x)), x))], + 'checkodesol_XFAIL':True + }, + + # This is from issue: https://github.com/sympy/sympy/issues/7093 + 'fact_19': { + 'eq': Derivative(f(x), x)**2 - x**3, + 'sol': [Eq(f(x), C1 - 2*x**Rational(5,2)/5), Eq(f(x), C1 + 2*x**Rational(5,2)/5)], + }, + + 'fact_20': { + 'eq': x*f(x).diff(x, 2) - x*f(x), + 'sol': [Eq(f(x), C1*exp(-x) + C2*exp(x))], + }, + } + } + + + +@_add_example_keys +def _get_examples_ode_sol_almost_linear(): + from sympy.functions.special.error_functions import Ei + A = Symbol('A', positive=True) + f = Function('f') + d = f(x).diff(x) + + return { + 'hint': "almost_linear", + 'func': f(x), + 'examples':{ + 'almost_lin_01': { + 'eq': x**2*f(x)**2*d + f(x)**3 + 1, + 'sol': [Eq(f(x), (C1*exp(3/x) - 1)**Rational(1, 3)), + Eq(f(x), (-1 - sqrt(3)*I)*(C1*exp(3/x) - 1)**Rational(1, 3)/2), + Eq(f(x), (-1 + sqrt(3)*I)*(C1*exp(3/x) - 1)**Rational(1, 3)/2)], + + }, + + 'almost_lin_02': { + 'eq': x*f(x)*d + 2*x*f(x)**2 + 1, + 'sol': [Eq(f(x), -sqrt((C1 - 2*Ei(4*x))*exp(-4*x))), Eq(f(x), sqrt((C1 - 2*Ei(4*x))*exp(-4*x)))] + }, + + 'almost_lin_03': { + 'eq': x*d + x*f(x) + 1, + 'sol': [Eq(f(x), (C1 - Ei(x))*exp(-x))] + }, + + 'almost_lin_04': { + 'eq': x*exp(f(x))*d + exp(f(x)) + 3*x, + 'sol': [Eq(f(x), log(C1/x - x*Rational(3, 2)))], + }, + + 'almost_lin_05': { + 'eq': x + A*(x + diff(f(x), x) + f(x)) + diff(f(x), x) + f(x) + 2, + 'sol': [Eq(f(x), (C1 + Piecewise( + (x, Eq(A + 1, 0)), ((-A*x + A - x - 1)*exp(x)/(A + 1), True)))*exp(-x))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_liouville(): + n = Symbol('n') + _y = Dummy('y') + return { + 'hint': "Liouville", + 'func': f(x), + 'examples':{ + 'liouville_01': { + 'eq': diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2, + 'sol': [Eq(f(x), log(x/(C1 + C2*x)))], + + }, + + 'liouville_02': { + 'eq': diff(x*exp(-f(x)), x, x), + 'sol': [Eq(f(x), log(x/(C1 + C2*x)))] + }, + + 'liouville_03': { + 'eq': ((diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2)*exp(-f(x))/exp(f(x))).expand(), + 'sol': [Eq(f(x), log(x/(C1 + C2*x)))] + }, + + 'liouville_04': { + 'eq': diff(f(x), x, x) + 1/f(x)*(diff(f(x), x))**2 + 1/x*diff(f(x), x), + 'sol': [Eq(f(x), -sqrt(C1 + C2*log(x))), Eq(f(x), sqrt(C1 + C2*log(x)))], + }, + + 'liouville_05': { + 'eq': x*diff(f(x), x, x) + x/f(x)*diff(f(x), x)**2 + x*diff(f(x), x), + 'sol': [Eq(f(x), -sqrt(C1 + C2*exp(-x))), Eq(f(x), sqrt(C1 + C2*exp(-x)))], + }, + + 'liouville_06': { + 'eq': Eq((x*exp(f(x))).diff(x, x), 0), + 'sol': [Eq(f(x), log(C1 + C2/x))], + }, + + 'liouville_07': { + 'eq': (diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2)*exp(-f(x))/exp(f(x)), + 'sol': [Eq(f(x), log(x/(C1 + C2*x)))], + }, + + 'liouville_08': { + 'eq': x**2*diff(f(x),x) + (n*f(x) + f(x)**2)*diff(f(x),x)**2 + diff(f(x), (x, 2)), + 'sol': [Eq(C1 + C2*lowergamma(Rational(1,3), x**3/3) + NonElementaryIntegral(exp(_y**3/3)*exp(_y**2*n/2), (_y, f(x))), 0)], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_nth_algebraic(): + M, m, r, t = symbols('M m r t') + phi = Function('phi') + k = Symbol('k') + # This one needs a substitution f' = g. + # 'algeb_12': { + # 'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x, + # 'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))], + # }, + return { + 'hint': "nth_algebraic", + 'func': f(x), + 'examples':{ + 'algeb_01': { + 'eq': f(x) * f(x).diff(x) * f(x).diff(x, x) * (f(x) - 1) * (f(x).diff(x) - x), + 'sol': [Eq(f(x), C1 + x**2/2), Eq(f(x), C1 + C2*x)] + }, + + 'algeb_02': { + 'eq': f(x) * f(x).diff(x) * f(x).diff(x, x) * (f(x) - 1), + 'sol': [Eq(f(x), C1 + C2*x)] + }, + + 'algeb_03': { + 'eq': f(x) * f(x).diff(x) * f(x).diff(x, x), + 'sol': [Eq(f(x), C1 + C2*x)] + }, + + 'algeb_04': { + 'eq': Eq(-M * phi(t).diff(t), + Rational(3, 2) * m * r**2 * phi(t).diff(t) * phi(t).diff(t,t)), + 'sol': [Eq(phi(t), C1), Eq(phi(t), C1 + C2*t - M*t**2/(3*m*r**2))], + 'func': phi(t) + }, + + 'algeb_05': { + 'eq': (1 - sin(f(x))) * f(x).diff(x), + 'sol': [Eq(f(x), C1)], + 'XFAIL': ['separable'] #It raised exception. + }, + + 'algeb_06': { + 'eq': (diff(f(x)) - x)*(diff(f(x)) + x), + 'sol': [Eq(f(x), C1 - x**2/2), Eq(f(x), C1 + x**2/2)] + }, + + 'algeb_07': { + 'eq': Eq(Derivative(f(x), x), Derivative(g(x), x)), + 'sol': [Eq(f(x), C1 + g(x))], + }, + + 'algeb_08': { + 'eq': f(x).diff(x) - C1, #this example is from issue 15999 + 'sol': [Eq(f(x), C1*x + C2)], + }, + + 'algeb_09': { + 'eq': f(x)*f(x).diff(x), + 'sol': [Eq(f(x), C1)], + }, + + 'algeb_10': { + 'eq': (diff(f(x)) - x)*(diff(f(x)) + x), + 'sol': [Eq(f(x), C1 - x**2/2), Eq(f(x), C1 + x**2/2)], + }, + + 'algeb_11': { + 'eq': f(x) + f(x)*f(x).diff(x), + 'sol': [Eq(f(x), 0), Eq(f(x), C1 - x)], + 'XFAIL': ['separable', '1st_exact', '1st_linear', 'Bernoulli', '1st_homogeneous_coeff_best', + '1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep', + 'lie_group', 'nth_linear_constant_coeff_undetermined_coefficients', + 'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients', + 'nth_linear_constant_coeff_variation_of_parameters', + 'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters'] + #nth_linear_constant_coeff_undetermined_coefficients raises exception rest all of them misses a solution. + }, + + 'algeb_12': { + 'eq': Derivative(x*f(x), x, x, x), + 'sol': [Eq(f(x), (C1 + C2*x + C3*x**2) / x)], + 'XFAIL': ['nth_algebraic'] # It passes only when prep=False is set in dsolve. + }, + + 'algeb_13': { + 'eq': Eq(Derivative(x*Derivative(f(x), x), x)/x, exp(x)), + 'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))], + 'XFAIL': ['nth_algebraic'] # It passes only when prep=False is set in dsolve. + }, + + # These are simple tests from the old ode module example 14-18 + 'algeb_14': { + 'eq': Eq(f(x).diff(x), 0), + 'sol': [Eq(f(x), C1)], + }, + + 'algeb_15': { + 'eq': Eq(3*f(x).diff(x) - 5, 0), + 'sol': [Eq(f(x), C1 + x*Rational(5, 3))], + }, + + 'algeb_16': { + 'eq': Eq(3*f(x).diff(x), 5), + 'sol': [Eq(f(x), C1 + x*Rational(5, 3))], + }, + + # Type: 2nd order, constant coefficients (two complex roots) + 'algeb_17': { + 'eq': Eq(3*f(x).diff(x) - 1, 0), + 'sol': [Eq(f(x), C1 + x/3)], + }, + + 'algeb_18': { + 'eq': Eq(x*f(x).diff(x) - 1, 0), + 'sol': [Eq(f(x), C1 + log(x))], + }, + + # https://github.com/sympy/sympy/issues/6989 + 'algeb_19': { + 'eq': f(x).diff(x) - x*exp(-k*x), + 'sol': [Eq(f(x), C1 + Piecewise(((-k*x - 1)*exp(-k*x)/k**2, Ne(k**2, 0)),(x**2/2, True)))], + }, + + 'algeb_20': { + 'eq': -f(x).diff(x) + x*exp(-k*x), + 'sol': [Eq(f(x), C1 + Piecewise(((-k*x - 1)*exp(-k*x)/k**2, Ne(k**2, 0)),(x**2/2, True)))], + }, + + # https://github.com/sympy/sympy/issues/10867 + 'algeb_21': { + 'eq': Eq(g(x).diff(x).diff(x), (x-2)**2 + (x-3)**3), + 'sol': [Eq(g(x), C1 + C2*x + x**5/20 - 2*x**4/3 + 23*x**3/6 - 23*x**2/2)], + 'func': g(x), + }, + + # https://github.com/sympy/sympy/issues/13691 + 'algeb_22': { + 'eq': f(x).diff(x) - C1*g(x).diff(x), + 'sol': [Eq(f(x), C2 + C1*g(x))], + 'func': f(x), + }, + + # https://github.com/sympy/sympy/issues/4838 + 'algeb_23': { + 'eq': f(x).diff(x) - 3*C1 - 3*x**2, + 'sol': [Eq(f(x), C2 + 3*C1*x + x**3)], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_nth_order_reducible(): + return { + 'hint': "nth_order_reducible", + 'func': f(x), + 'examples':{ + 'reducible_01': { + 'eq': Eq(x*Derivative(f(x), x)**2 + Derivative(f(x), x, 2), 0), + 'sol': [Eq(f(x),C1 - sqrt(-1/C2)*log(-C2*sqrt(-1/C2) + x) + + sqrt(-1/C2)*log(C2*sqrt(-1/C2) + x))], + 'slow': True, + }, + + 'reducible_02': { + 'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x, + 'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))], + 'slow': True, + }, + + 'reducible_03': { + 'eq': Eq(sqrt(2) * f(x).diff(x,x,x) + f(x).diff(x), 0), + 'sol': [Eq(f(x), C1 + C2*sin(2**Rational(3, 4)*x/2) + C3*cos(2**Rational(3, 4)*x/2))], + 'slow': True, + }, + + 'reducible_04': { + 'eq': f(x).diff(x, 2) + 2*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-2*x))], + }, + + 'reducible_05': { + 'eq': f(x).diff(x, 3) + f(x).diff(x, 2) - 6*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-3*x) + C3*exp(2*x))], + 'slow': True, + }, + + 'reducible_06': { + 'eq': f(x).diff(x, 4) - f(x).diff(x, 3) - 4*f(x).diff(x, 2) + \ + 4*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-2*x) + C3*exp(x) + C4*exp(2*x))], + 'slow': True, + }, + + 'reducible_07': { + 'eq': f(x).diff(x, 4) + 3*f(x).diff(x, 3), + 'sol': [Eq(f(x), C1 + C2*x + C3*x**2 + C4*exp(-3*x))], + 'slow': True, + }, + + 'reducible_08': { + 'eq': f(x).diff(x, 4) - 2*f(x).diff(x, 2), + 'sol': [Eq(f(x), C1 + C2*x + C3*exp(-sqrt(2)*x) + C4*exp(sqrt(2)*x))], + 'slow': True, + }, + + 'reducible_09': { + 'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 2), + 'sol': [Eq(f(x), C1 + C2*x + C3*sin(2*x) + C4*cos(2*x))], + 'slow': True, + }, + + 'reducible_10': { + 'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*x*sin(x) + C2*cos(x) - C3*x*cos(x) + C3*sin(x) + C4*sin(x) + C5*cos(x))], + 'slow': True, + }, + + 'reducible_11': { + 'eq': f(x).diff(x, 2) - f(x).diff(x)**3, + 'sol': [Eq(f(x), C1 - sqrt(2)*sqrt(-1/(C2 + x))*(C2 + x)), + Eq(f(x), C1 + sqrt(2)*sqrt(-1/(C2 + x))*(C2 + x))], + 'slow': True, + }, + + # Needs to be a way to know how to combine derivatives in the expression + 'reducible_12': { + 'eq': Derivative(x*f(x), x, x, x) + Derivative(f(x), x, x, x), + 'sol': [Eq(f(x), C1 + C3/Mul(2, (x**2 + 2*x + 1), evaluate=False) + + x*(C2 + C3/Mul(2, (x**2 + 2*x + 1), evaluate=False)))], # 2-arg Mul! + 'slow': True, + }, + } + } + + + +@_add_example_keys +def _get_examples_ode_sol_nth_linear_undetermined_coefficients(): + # examples 3-27 below are from Ordinary Differential Equations, + # Tenenbaum and Pollard, pg. 231 + g = exp(-x) + f2 = f(x).diff(x, 2) + c = 3*f(x).diff(x, 3) + 5*f2 + f(x).diff(x) - f(x) - x + t = symbols("t") + u = symbols("u",cls=Function) + R, L, C, E_0, alpha = symbols("R L C E_0 alpha",positive=True) + omega = Symbol('omega') + return { + 'hint': "nth_linear_constant_coeff_undetermined_coefficients", + 'func': f(x), + 'examples':{ + 'undet_01': { + 'eq': c - x*g, + 'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x**2/24 - 3*x/32))*exp(-x) - 1)], + 'slow': True, + }, + + 'undet_02': { + 'eq': c - g, + 'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x/8))*exp(-x) - 1)], + 'slow': True, + }, + + 'undet_03': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 4, + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2)], + 'slow': True, + }, + + 'undet_04': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 12*exp(x), + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2*exp(x))], + 'slow': True, + }, + + 'undet_05': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - exp(I*x), + 'sol': [Eq(f(x), (S(3)/10 + I/10)*(C1*exp(-2*x) + C2*exp(-x) - I*exp(I*x)))], + 'slow': True, + }, + + 'undet_06': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - sin(x), + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + sin(x)/10 - 3*cos(x)/10)], + 'slow': True, + }, + + 'undet_07': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - cos(x), + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 3*sin(x)/10 + cos(x)/10)], + 'slow': True, + }, + + 'undet_08': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - (8 + 6*exp(x) + 2*sin(x)), + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + exp(x) + sin(x)/5 - 3*cos(x)/5 + 4)], + 'slow': True, + }, + + 'undet_09': { + 'eq': f2 + f(x).diff(x) + f(x) - x**2, + 'sol': [Eq(f(x), -2*x + x**2 + (C1*sin(x*sqrt(3)/2) + C2*cos(x*sqrt(3)/2))*exp(-x/2))], + 'slow': True, + }, + + 'undet_10': { + 'eq': f2 - 2*f(x).diff(x) - 8*f(x) - 9*x*exp(x) - 10*exp(-x), + 'sol': [Eq(f(x), -x*exp(x) - 2*exp(-x) + C1*exp(-2*x) + C2*exp(4*x))], + 'slow': True, + }, + + 'undet_11': { + 'eq': f2 - 3*f(x).diff(x) - 2*exp(2*x)*sin(x), + 'sol': [Eq(f(x), C1 + C2*exp(3*x) - 3*exp(2*x)*sin(x)/5 - exp(2*x)*cos(x)/5)], + 'slow': True, + }, + + 'undet_12': { + 'eq': f(x).diff(x, 4) - 2*f2 + f(x) - x + sin(x), + 'sol': [Eq(f(x), x - sin(x)/4 + (C1 + C2*x)*exp(-x) + (C3 + C4*x)*exp(x))], + 'slow': True, + }, + + 'undet_13': { + 'eq': f2 + f(x).diff(x) - x**2 - 2*x, + 'sol': [Eq(f(x), C1 + x**3/3 + C2*exp(-x))], + 'slow': True, + }, + + 'undet_14': { + 'eq': f2 + f(x).diff(x) - x - sin(2*x), + 'sol': [Eq(f(x), C1 - x - sin(2*x)/5 - cos(2*x)/10 + x**2/2 + C2*exp(-x))], + 'slow': True, + }, + + 'undet_15': { + 'eq': f2 + f(x) - 4*x*sin(x), + 'sol': [Eq(f(x), (C1 - x**2)*cos(x) + (C2 + x)*sin(x))], + 'slow': True, + }, + + 'undet_16': { + 'eq': f2 + 4*f(x) - x*sin(2*x), + 'sol': [Eq(f(x), (C1 - x**2/8)*cos(2*x) + (C2 + x/16)*sin(2*x))], + 'slow': True, + }, + + 'undet_17': { + 'eq': f2 + 2*f(x).diff(x) + f(x) - x**2*exp(-x), + 'sol': [Eq(f(x), (C1 + x*(C2 + x**3/12))*exp(-x))], + 'slow': True, + }, + + 'undet_18': { + 'eq': f(x).diff(x, 3) + 3*f2 + 3*f(x).diff(x) + f(x) - 2*exp(-x) + \ + x**2*exp(-x), + 'sol': [Eq(f(x), (C1 + x*(C2 + x*(C3 - x**3/60 + x/3)))*exp(-x))], + 'slow': True, + }, + + 'undet_19': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - exp(-2*x) - x**2, + 'sol': [Eq(f(x), C2*exp(-x) + x**2/2 - x*Rational(3,2) + (C1 - x)*exp(-2*x) + Rational(7,4))], + 'slow': True, + }, + + 'undet_20': { + 'eq': f2 - 3*f(x).diff(x) + 2*f(x) - x*exp(-x), + 'sol': [Eq(f(x), C1*exp(x) + C2*exp(2*x) + (6*x + 5)*exp(-x)/36)], + 'slow': True, + }, + + 'undet_21': { + 'eq': f2 + f(x).diff(x) - 6*f(x) - x - exp(2*x), + 'sol': [Eq(f(x), Rational(-1, 36) - x/6 + C2*exp(-3*x) + (C1 + x/5)*exp(2*x))], + 'slow': True, + }, + + 'undet_22': { + 'eq': f2 + f(x) - sin(x) - exp(-x), + 'sol': [Eq(f(x), C2*sin(x) + (C1 - x/2)*cos(x) + exp(-x)/2)], + 'slow': True, + }, + + 'undet_23': { + 'eq': f(x).diff(x, 3) - 3*f2 + 3*f(x).diff(x) - f(x) - exp(x), + 'sol': [Eq(f(x), (C1 + x*(C2 + x*(C3 + x/6)))*exp(x))], + 'slow': True, + }, + + 'undet_24': { + 'eq': f2 + f(x) - S.Half - cos(2*x)/2, + 'sol': [Eq(f(x), S.Half - cos(2*x)/6 + C1*sin(x) + C2*cos(x))], + 'slow': True, + }, + + 'undet_25': { + 'eq': f(x).diff(x, 3) - f(x).diff(x) - exp(2*x)*(S.Half - cos(2*x)/2), + 'sol': [Eq(f(x), C1 + C2*exp(-x) + C3*exp(x) + (-21*sin(2*x) + 27*cos(2*x) + 130)*exp(2*x)/1560)], + 'slow': True, + }, + + #Note: 'undet_26' is referred in 'undet_37' + 'undet_26': { + 'eq': (f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - + sin(x) - cos(x)), + 'sol': [Eq(f(x), C1 + x**2 + (C2 + x*(C3 - x/8))*sin(x) + (C4 + x*(C5 + x/8))*cos(x))], + 'slow': True, + }, + + 'undet_27': { + 'eq': f2 + f(x) - cos(x)/2 + cos(3*x)/2, + 'sol': [Eq(f(x), cos(3*x)/16 + C2*cos(x) + (C1 + x/4)*sin(x))], + 'slow': True, + }, + + 'undet_28': { + 'eq': f(x).diff(x) - 1, + 'sol': [Eq(f(x), C1 + x)], + 'slow': True, + }, + + # https://github.com/sympy/sympy/issues/19358 + 'undet_29': { + 'eq': f2 + f(x).diff(x) + exp(x-C1), + 'sol': [Eq(f(x), C2 + C3*exp(-x) - exp(-C1 + x)/2)], + 'slow': True, + }, + + # https://github.com/sympy/sympy/issues/18408 + 'undet_30': { + 'eq': f(x).diff(x, 3) - f(x).diff(x) - sinh(x), + 'sol': [Eq(f(x), C1 + C2*exp(-x) + C3*exp(x) + x*sinh(x)/2)], + }, + + 'undet_31': { + 'eq': f(x).diff(x, 2) - 49*f(x) - sinh(3*x), + 'sol': [Eq(f(x), C1*exp(-7*x) + C2*exp(7*x) - sinh(3*x)/40)], + }, + + 'undet_32': { + 'eq': f(x).diff(x, 3) - f(x).diff(x) - sinh(x) - exp(x), + 'sol': [Eq(f(x), C1 + C3*exp(-x) + x*sinh(x)/2 + (C2 + x/2)*exp(x))], + }, + + # https://github.com/sympy/sympy/issues/5096 + 'undet_33': { + 'eq': f(x).diff(x, x) + f(x) - x*sin(x - 2), + 'sol': [Eq(f(x), C1*sin(x) + C2*cos(x) - x**2*cos(x - 2)/4 + x*sin(x - 2)/4)], + }, + + 'undet_34': { + 'eq': f(x).diff(x, 2) + f(x) - x**4*sin(x-1), + 'sol': [ Eq(f(x), C1*sin(x) + C2*cos(x) - x**5*cos(x - 1)/10 + x**4*sin(x - 1)/4 + x**3*cos(x - 1)/2 - 3*x**2*sin(x - 1)/4 - 3*x*cos(x - 1)/4)], + }, + + 'undet_35': { + 'eq': f(x).diff(x, 2) - f(x) - exp(x - 1), + 'sol': [Eq(f(x), C2*exp(-x) + (C1 + x*exp(-1)/2)*exp(x))], + }, + + 'undet_36': { + 'eq': f(x).diff(x, 2)+f(x)-(sin(x-2)+1), + 'sol': [Eq(f(x), C1*sin(x) + C2*cos(x) - x*cos(x - 2)/2 + 1)], + }, + + # Equivalent to example_name 'undet_26'. + # This previously failed because the algorithm for undetermined coefficients + # didn't know to multiply exp(I*x) by sufficient x because it is linearly + # dependent on sin(x) and cos(x). + 'undet_37': { + 'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x), + 'sol': [Eq(f(x), C1 + x**2*(I*exp(I*x)/8 + 1) + (C2 + C3*x)*sin(x) + (C4 + C5*x)*cos(x))], + }, + + # https://github.com/sympy/sympy/issues/12623 + 'undet_38': { + 'eq': Eq( u(t).diff(t,t) + R /L*u(t).diff(t) + 1/(L*C)*u(t), alpha), + 'sol': [Eq(u(t), C*L*alpha + C2*exp(-t*(R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + + C1*exp(t*(-R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)))], + 'func': u(t) + }, + + 'undet_39': { + 'eq': Eq( L*C*u(t).diff(t,t) + R*C*u(t).diff(t) + u(t), E_0*exp(I*omega*t) ), + 'sol': [Eq(u(t), C2*exp(-t*(R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + + C1*exp(t*(-R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + - E_0*exp(I*omega*t)/(C*L*omega**2 - I*C*R*omega - 1))], + 'func': u(t), + }, + + # https://github.com/sympy/sympy/issues/6879 + 'undet_40': { + 'eq': Eq(Derivative(f(x), x, 2) - 2*Derivative(f(x), x) + f(x), sin(x)), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(x) + cos(x)/2)], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_separable(): + # test_separable1-5 are from Ordinary Differential Equations, Tenenbaum and + # Pollard, pg. 55 + t,a = symbols('a,t') + m = 96 + g = 9.8 + k = .2 + f1 = g * m + v = Function('v') + return { + 'hint': "separable", + 'func': f(x), + 'examples':{ + 'separable_01': { + 'eq': f(x).diff(x) - f(x), + 'sol': [Eq(f(x), C1*exp(x))], + }, + + 'separable_02': { + 'eq': x*f(x).diff(x) - f(x), + 'sol': [Eq(f(x), C1*x)], + }, + + 'separable_03': { + 'eq': f(x).diff(x) + sin(x), + 'sol': [Eq(f(x), C1 + cos(x))], + }, + + 'separable_04': { + 'eq': f(x)**2 + 1 - (x**2 + 1)*f(x).diff(x), + 'sol': [Eq(f(x), tan(C1 + atan(x)))], + }, + + 'separable_05': { + 'eq': f(x).diff(x)/tan(x) - f(x) - 2, + 'sol': [Eq(f(x), C1/cos(x) - 2)], + }, + + 'separable_06': { + 'eq': f(x).diff(x) * (1 - sin(f(x))) - 1, + 'sol': [Eq(-x + f(x) + cos(f(x)), C1)], + }, + + 'separable_07': { + 'eq': f(x)*x**2*f(x).diff(x) - f(x)**3 - 2*x**2*f(x).diff(x), + 'sol': [Eq(f(x), (-x - sqrt(x*(4*C1*x + x - 4)))/(C1*x - 1)/2), + Eq(f(x), (-x + sqrt(x*(4*C1*x + x - 4)))/(C1*x - 1)/2)], + 'slow': True, + }, + + 'separable_08': { + 'eq': f(x)**2 - 1 - (2*f(x) + x*f(x))*f(x).diff(x), + 'sol': [Eq(f(x), -sqrt(C1*x**2 + 4*C1*x + 4*C1 + 1)), + Eq(f(x), sqrt(C1*x**2 + 4*C1*x + 4*C1 + 1))], + 'slow': True, + }, + + 'separable_09': { + 'eq': x*log(x)*f(x).diff(x) + sqrt(1 + f(x)**2), + 'sol': [Eq(f(x), sinh(C1 - log(log(x))))], #One more solution is f(x)=I + 'slow': True, + 'checkodesol_XFAIL': True, + }, + + 'separable_10': { + 'eq': exp(x + 1)*tan(f(x)) + cos(f(x))*f(x).diff(x), + 'sol': [Eq(E*exp(x) + log(cos(f(x)) - 1)/2 - log(cos(f(x)) + 1)/2 + cos(f(x)), C1)], + 'slow': True, + }, + + 'separable_11': { + 'eq': (x*cos(f(x)) + x**2*sin(f(x))*f(x).diff(x) - a**2*sin(f(x))*f(x).diff(x)), + 'sol': [ + Eq(f(x), -acos(C1*sqrt(-a**2 + x**2)) + 2*pi), + Eq(f(x), acos(C1*sqrt(-a**2 + x**2))) + ], + 'slow': True, + }, + + 'separable_12': { + 'eq': f(x).diff(x) - f(x)*tan(x), + 'sol': [Eq(f(x), C1/cos(x))], + }, + + 'separable_13': { + 'eq': (x - 1)*cos(f(x))*f(x).diff(x) - 2*x*sin(f(x)), + 'sol': [ + Eq(f(x), pi - asin(C1*(x**2 - 2*x + 1)*exp(2*x))), + Eq(f(x), asin(C1*(x**2 - 2*x + 1)*exp(2*x))) + ], + }, + + 'separable_14': { + 'eq': f(x).diff(x) - f(x)*log(f(x))/tan(x), + 'sol': [Eq(f(x), exp(C1*sin(x)))], + }, + + 'separable_15': { + 'eq': x*f(x).diff(x) + (1 + f(x)**2)*atan(f(x)), + 'sol': [Eq(f(x), tan(C1/x))], #Two more solutions are f(x)=0 and f(x)=I + 'slow': True, + 'checkodesol_XFAIL': True, + }, + + 'separable_16': { + 'eq': f(x).diff(x) + x*(f(x) + 1), + 'sol': [Eq(f(x), -1 + C1*exp(-x**2/2))], + }, + + 'separable_17': { + 'eq': exp(f(x)**2)*(x**2 + 2*x + 1) + (x*f(x) + f(x))*f(x).diff(x), + 'sol': [ + Eq(f(x), -sqrt(log(1/(C1 + x**2 + 2*x)))), + Eq(f(x), sqrt(log(1/(C1 + x**2 + 2*x)))) + ], + }, + + 'separable_18': { + 'eq': f(x).diff(x) + f(x), + 'sol': [Eq(f(x), C1*exp(-x))], + }, + + 'separable_19': { + 'eq': sin(x)*cos(2*f(x)) + cos(x)*sin(2*f(x))*f(x).diff(x), + 'sol': [Eq(f(x), pi - acos(C1/cos(x)**2)/2), Eq(f(x), acos(C1/cos(x)**2)/2)], + }, + + 'separable_20': { + 'eq': (1 - x)*f(x).diff(x) - x*(f(x) + 1), + 'sol': [Eq(f(x), (C1*exp(-x) - x + 1)/(x - 1))], + }, + + 'separable_21': { + 'eq': f(x)*diff(f(x), x) + x - 3*x*f(x)**2, + 'sol': [Eq(f(x), -sqrt(3)*sqrt(C1*exp(3*x**2) + 1)/3), + Eq(f(x), sqrt(3)*sqrt(C1*exp(3*x**2) + 1)/3)], + }, + + 'separable_22': { + 'eq': f(x).diff(x) - exp(x + f(x)), + 'sol': [Eq(f(x), log(-1/(C1 + exp(x))))], + 'XFAIL': ['lie_group'] #It shows 'NoneType' object is not subscriptable for lie_group. + }, + + # https://github.com/sympy/sympy/issues/7081 + 'separable_23': { + 'eq': x*(f(x).diff(x)) + 1 - f(x)**2, + 'sol': [Eq(f(x), (-C1 - x**2)/(-C1 + x**2))], + }, + + # https://github.com/sympy/sympy/issues/10379 + 'separable_24': { + 'eq': f(t).diff(t)-(1-51.05*y*f(t)), + 'sol': [Eq(f(t), (0.019588638589618023*exp(y*(C1 - 51.049999999999997*t)) + 0.019588638589618023)/y)], + 'func': f(t), + }, + + # https://github.com/sympy/sympy/issues/15999 + 'separable_25': { + 'eq': f(x).diff(x) - C1*f(x), + 'sol': [Eq(f(x), C2*exp(C1*x))], + }, + + 'separable_26': { + 'eq': f1 - k * (v(t) ** 2) - m * Derivative(v(t)), + 'sol': [Eq(v(t), -68.585712797928991/tanh(C1 - 0.14288690166235204*t))], + 'func': v(t), + 'checkodesol_XFAIL': True, + }, + + #https://github.com/sympy/sympy/issues/22155 + 'separable_27': { + 'eq': f(x).diff(x) - exp(f(x) - x), + 'sol': [Eq(f(x), log(-exp(x)/(C1*exp(x) - 1)))], + } + } + } + + +@_add_example_keys +def _get_examples_ode_sol_1st_exact(): + # Type: Exact differential equation, p(x,f) + q(x,f)*f' == 0, + # where dp/df == dq/dx + ''' + Example 7 is an exact equation that fails under the exact engine. It is caught + by first order homogeneous albeit with a much contorted solution. The + exact engine fails because of a poorly simplified integral of q(0,y)dy, + where q is the function multiplying f'. The solutions should be + Eq(sqrt(x**2+f(x)**2)**3+y**3, C1). The equation below is + equivalent, but it is so complex that checkodesol fails, and takes a long + time to do so. + ''' + return { + 'hint': "1st_exact", + 'func': f(x), + 'examples':{ + '1st_exact_01': { + 'eq': sin(x)*cos(f(x)) + cos(x)*sin(f(x))*f(x).diff(x), + 'sol': [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))], + 'slow': True, + }, + + '1st_exact_02': { + 'eq': (2*x*f(x) + 1)/f(x) + (f(x) - x)/f(x)**2*f(x).diff(x), + 'sol': [Eq(f(x), exp(C1 - x**2 + LambertW(-x*exp(-C1 + x**2))))], + 'XFAIL': ['lie_group'], #It shows dsolve raises an exception: List index out of range for lie_group + 'slow': True, + 'checkodesol_XFAIL':True + }, + + '1st_exact_03': { + 'eq': 2*x + f(x)*cos(x) + (2*f(x) + sin(x) - sin(f(x)))*f(x).diff(x), + 'sol': [Eq(f(x)*sin(x) + cos(f(x)) + x**2 + f(x)**2, C1)], + 'XFAIL': ['lie_group'], #It goes into infinite loop for lie_group. + 'slow': True, + }, + + '1st_exact_04': { + 'eq': cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x), + 'sol': [Eq(x*cos(f(x)) + f(x)**3/3, C1)], + 'slow': True, + }, + + '1st_exact_05': { + 'eq': 2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), + 'sol': [Eq(x**2*f(x) + f(x)**3/3, C1)], + 'slow': True, + 'simplify_flag':False + }, + + # This was from issue: https://github.com/sympy/sympy/issues/11290 + '1st_exact_06': { + 'eq': cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x), + 'sol': [Eq(x*cos(f(x)) + f(x)**3/3, C1)], + 'simplify_flag':False + }, + + '1st_exact_07': { + 'eq': x*sqrt(x**2 + f(x)**2) - (x**2*f(x)/(f(x) - sqrt(x**2 + f(x)**2)))*f(x).diff(x), + 'sol': [Eq(log(x), + C1 - 9*sqrt(1 + f(x)**2/x**2)*asinh(f(x)/x)/(-27*f(x)/x + + 27*sqrt(1 + f(x)**2/x**2)) - 9*sqrt(1 + f(x)**2/x**2)* + log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/ + (-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2)) + + 9*asinh(f(x)/x)*f(x)/(x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))) + + 9*f(x)*log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/ + (x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))))], + 'slow': True, + 'dsolve_too_slow':True + }, + + # Type: a(x)f'(x)+b(x)*f(x)+c(x)=0 + '1st_exact_08': { + 'eq': Eq(x**2*f(x).diff(x) + 3*x*f(x) - sin(x)/x, 0), + 'sol': [Eq(f(x), (C1 - cos(x))/x**3)], + }, + + # these examples are from test_exact_enhancement + '1st_exact_09': { + 'eq': f(x)/x**2 + ((f(x)*x - 1)/x)*f(x).diff(x), + 'sol': [Eq(f(x), (i*sqrt(C1*x**2 + 1) + 1)/x) for i in (-1, 1)], + }, + + '1st_exact_10': { + 'eq': (x*f(x) - 1) + f(x).diff(x)*(x**2 - x*f(x)), + 'sol': [Eq(f(x), x - sqrt(C1 + x**2 - 2*log(x))), Eq(f(x), x + sqrt(C1 + x**2 - 2*log(x)))], + }, + + '1st_exact_11': { + 'eq': (x + 2)*sin(f(x)) + f(x).diff(x)*x*cos(f(x)), + 'sol': [Eq(f(x), -asin(C1*exp(-x)/x**2) + pi), Eq(f(x), asin(C1*exp(-x)/x**2))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_nth_linear_var_of_parameters(): + g = exp(-x) + f2 = f(x).diff(x, 2) + c = 3*f(x).diff(x, 3) + 5*f2 + f(x).diff(x) - f(x) - x + return { + 'hint': "nth_linear_constant_coeff_variation_of_parameters", + 'func': f(x), + 'examples':{ + 'var_of_parameters_01': { + 'eq': c - x*g, + 'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x**2/24 - 3*x/32))*exp(-x) - 1)], + 'slow': True, + }, + + 'var_of_parameters_02': { + 'eq': c - g, + 'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x/8))*exp(-x) - 1)], + 'slow': True, + }, + + 'var_of_parameters_03': { + 'eq': f(x).diff(x) - 1, + 'sol': [Eq(f(x), C1 + x)], + 'slow': True, + }, + + 'var_of_parameters_04': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 4, + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2)], + 'slow': True, + }, + + 'var_of_parameters_05': { + 'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 12*exp(x), + 'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2*exp(x))], + 'slow': True, + }, + + 'var_of_parameters_06': { + 'eq': f2 - 2*f(x).diff(x) - 8*f(x) - 9*x*exp(x) - 10*exp(-x), + 'sol': [Eq(f(x), -x*exp(x) - 2*exp(-x) + C1*exp(-2*x) + C2*exp(4*x))], + 'slow': True, + }, + + 'var_of_parameters_07': { + 'eq': f2 + 2*f(x).diff(x) + f(x) - x**2*exp(-x), + 'sol': [Eq(f(x), (C1 + x*(C2 + x**3/12))*exp(-x))], + 'slow': True, + }, + + 'var_of_parameters_08': { + 'eq': f2 - 3*f(x).diff(x) + 2*f(x) - x*exp(-x), + 'sol': [Eq(f(x), C1*exp(x) + C2*exp(2*x) + (6*x + 5)*exp(-x)/36)], + 'slow': True, + }, + + 'var_of_parameters_09': { + 'eq': f(x).diff(x, 3) - 3*f2 + 3*f(x).diff(x) - f(x) - exp(x), + 'sol': [Eq(f(x), (C1 + x*(C2 + x*(C3 + x/6)))*exp(x))], + 'slow': True, + }, + + 'var_of_parameters_10': { + 'eq': f2 + 2*f(x).diff(x) + f(x) - exp(-x)/x, + 'sol': [Eq(f(x), (C1 + x*(C2 + log(x)))*exp(-x))], + 'slow': True, + }, + + 'var_of_parameters_11': { + 'eq': f2 + f(x) - 1/sin(x)*1/cos(x), + 'sol': [Eq(f(x), (C1 + log(sin(x) - 1)/2 - log(sin(x) + 1)/2 + )*cos(x) + (C2 + log(cos(x) - 1)/2 - log(cos(x) + 1)/2)*sin(x))], + 'slow': True, + }, + + 'var_of_parameters_12': { + 'eq': f(x).diff(x, 4) - 1/x, + 'sol': [Eq(f(x), C1 + C2*x + C3*x**2 + x**3*(C4 + log(x)/6))], + 'slow': True, + }, + + # These were from issue: https://github.com/sympy/sympy/issues/15996 + 'var_of_parameters_13': { + 'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x), + 'sol': [Eq(f(x), C1 + x**2 + (C2 + x*(C3 - x/8 + 3*exp(I*x)/2 + 3*exp(-I*x)/2) + 5*exp(2*I*x)/16 + 2*I*exp(I*x) - 2*I*exp(-I*x))*sin(x) + (C4 + x*(C5 + I*x/8 + 3*I*exp(I*x)/2 - 3*I*exp(-I*x)/2) + + 5*I*exp(2*I*x)/16 - 2*exp(I*x) - 2*exp(-I*x))*cos(x) - I*exp(I*x))], + }, + + 'var_of_parameters_14': { + 'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - exp(I*x), + 'sol': [Eq(f(x), C1 + (C2 + x*(C3 - x/8) + 5*exp(2*I*x)/16)*sin(x) + (C4 + x*(C5 + I*x/8) + 5*I*exp(2*I*x)/16)*cos(x) - I*exp(I*x))], + }, + + # https://github.com/sympy/sympy/issues/14395 + 'var_of_parameters_15': { + 'eq': Derivative(f(x), x, x) + 9*f(x) - sec(x), + 'sol': [Eq(f(x), (C1 - x/3 + sin(2*x)/3)*sin(3*x) + (C2 + log(cos(x)) + - 2*log(cos(x)**2)/3 + 2*cos(x)**2/3)*cos(3*x))], + 'slow': True, + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_2nd_linear_bessel(): + return { + 'hint': "2nd_linear_bessel", + 'func': f(x), + 'examples':{ + '2nd_lin_bessel_01': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - 4)*f(x), + 'sol': [Eq(f(x), C1*besselj(2, x) + C2*bessely(2, x))], + }, + + '2nd_lin_bessel_02': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 +25)*f(x), + 'sol': [Eq(f(x), C1*besselj(5*I, x) + C2*bessely(5*I, x))], + }, + + '2nd_lin_bessel_03': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2)*f(x), + 'sol': [Eq(f(x), C1*besselj(0, x) + C2*bessely(0, x))], + }, + + '2nd_lin_bessel_04': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (81*x**2 -S(1)/9)*f(x), + 'sol': [Eq(f(x), C1*besselj(S(1)/3, 9*x) + C2*bessely(S(1)/3, 9*x))], + }, + + '2nd_lin_bessel_05': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**4 - 4)*f(x), + 'sol': [Eq(f(x), C1*besselj(1, x**2/2) + C2*bessely(1, x**2/2))], + }, + + '2nd_lin_bessel_06': { + 'eq': x**2*(f(x).diff(x, 2)) + 2*x*(f(x).diff(x)) + (x**4 - 4)*f(x), + 'sol': [Eq(f(x), (C1*besselj(sqrt(17)/4, x**2/2) + C2*bessely(sqrt(17)/4, x**2/2))/sqrt(x))], + }, + + '2nd_lin_bessel_07': { + 'eq': x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - S(1)/4)*f(x), + 'sol': [Eq(f(x), C1*besselj(S(1)/2, x) + C2*bessely(S(1)/2, x))], + }, + + '2nd_lin_bessel_08': { + 'eq': x**2*(f(x).diff(x, 2)) - 3*x*(f(x).diff(x)) + (4*x + 4)*f(x), + 'sol': [Eq(f(x), x**2*(C1*besselj(0, 4*sqrt(x)) + C2*bessely(0, 4*sqrt(x))))], + }, + + '2nd_lin_bessel_09': { + 'eq': x*(f(x).diff(x, 2)) - f(x).diff(x) + 4*x**3*f(x), + 'sol': [Eq(f(x), x*(C1*besselj(S(1)/2, x**2) + C2*bessely(S(1)/2, x**2)))], + }, + + '2nd_lin_bessel_10': { + 'eq': (x-2)**2*(f(x).diff(x, 2)) - (x-2)*f(x).diff(x) + 4*(x-2)**2*f(x), + 'sol': [Eq(f(x), (x - 2)*(C1*besselj(1, 2*x - 4) + C2*bessely(1, 2*x - 4)))], + }, + + # https://github.com/sympy/sympy/issues/4414 + '2nd_lin_bessel_11': { + 'eq': f(x).diff(x, x) + 2/x*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), (C1*besselj(S(1)/2, x) + C2*bessely(S(1)/2, x))/sqrt(x))], + }, + '2nd_lin_bessel_12': { + 'eq': x**2*f(x).diff(x, 2) + x*f(x).diff(x) + (a**2*x**2/c**2 - b**2)*f(x), + 'sol': [Eq(f(x), C1*besselj(sqrt(b**2), x*sqrt(a**2/c**2)) + C2*bessely(sqrt(b**2), x*sqrt(a**2/c**2)))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_2nd_2F1_hypergeometric(): + return { + 'hint': "2nd_hypergeometric", + 'func': f(x), + 'examples':{ + '2nd_2F1_hyper_01': { + 'eq': x*(x-1)*f(x).diff(x, 2) + (S(3)/2 -2*x)*f(x).diff(x) + 2*f(x), + 'sol': [Eq(f(x), C1*x**(S(5)/2)*hyper((S(3)/2, S(1)/2), (S(7)/2,), x) + C2*hyper((-1, -2), (-S(3)/2,), x))], + }, + + '2nd_2F1_hyper_02': { + 'eq': x*(x-1)*f(x).diff(x, 2) + (S(7)/2*x)*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), (C1*(1 - x)**(S(5)/2)*hyper((S(1)/2, 2), (S(7)/2,), 1 - x) + + C2*hyper((-S(1)/2, -2), (-S(3)/2,), 1 - x))/(x - 1)**(S(5)/2))], + }, + + '2nd_2F1_hyper_03': { + 'eq': x*(x-1)*f(x).diff(x, 2) + (S(3)+ S(7)/2*x)*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), (C1*(1 - x)**(S(11)/2)*hyper((S(1)/2, 2), (S(13)/2,), 1 - x) + + C2*hyper((-S(7)/2, -5), (-S(9)/2,), 1 - x))/(x - 1)**(S(11)/2))], + }, + + '2nd_2F1_hyper_04': { + 'eq': -x**(S(5)/7)*(-416*x**(S(9)/7)/9 - 2385*x**(S(5)/7)/49 + S(298)*x/3)*f(x)/(196*(-x**(S(6)/7) + + x)**2*(x**(S(6)/7) + x)**2) + Derivative(f(x), (x, 2)), + 'sol': [Eq(f(x), x**(S(45)/98)*(C1*x**(S(4)/49)*hyper((S(1)/3, -S(1)/2), (S(9)/7,), x**(S(2)/7)) + + C2*hyper((S(1)/21, -S(11)/14), (S(5)/7,), x**(S(2)/7)))/(x**(S(2)/7) - 1)**(S(19)/84))], + 'checkodesol_XFAIL':True, + }, + } + } + +@_add_example_keys +def _get_examples_ode_sol_2nd_nonlinear_autonomous_conserved(): + return { + 'hint': "2nd_nonlinear_autonomous_conserved", + 'func': f(x), + 'examples': { + '2nd_nonlinear_autonomous_conserved_01': { + 'eq': f(x).diff(x, 2) + exp(f(x)) + log(f(x)), + 'sol': [ + Eq(Integral(1/sqrt(C1 - 2*_u*log(_u) + 2*_u - 2*exp(_u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 - 2*_u*log(_u) + 2*_u - 2*exp(_u)), (_u, f(x))), C2 - x) + ], + 'simplify_flag': False, + }, + '2nd_nonlinear_autonomous_conserved_02': { + 'eq': f(x).diff(x, 2) + cbrt(f(x)) + 1/f(x), + 'sol': [ + Eq(sqrt(2)*Integral(1/sqrt(2*C1 - 3*_u**Rational(4, 3) - 4*log(_u)), (_u, f(x))), C2 + x), + Eq(sqrt(2)*Integral(1/sqrt(2*C1 - 3*_u**Rational(4, 3) - 4*log(_u)), (_u, f(x))), C2 - x) + ], + 'simplify_flag': False, + }, + '2nd_nonlinear_autonomous_conserved_03': { + 'eq': f(x).diff(x, 2) + sin(f(x)), + 'sol': [ + Eq(Integral(1/sqrt(C1 + 2*cos(_u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 + 2*cos(_u)), (_u, f(x))), C2 - x) + ], + 'simplify_flag': False, + }, + '2nd_nonlinear_autonomous_conserved_04': { + 'eq': f(x).diff(x, 2) + cosh(f(x)), + 'sol': [ + Eq(Integral(1/sqrt(C1 - 2*sinh(_u)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 - 2*sinh(_u)), (_u, f(x))), C2 - x) + ], + 'simplify_flag': False, + }, + '2nd_nonlinear_autonomous_conserved_05': { + 'eq': f(x).diff(x, 2) + asin(f(x)), + 'sol': [ + Eq(Integral(1/sqrt(C1 - 2*_u*asin(_u) - 2*sqrt(1 - _u**2)), (_u, f(x))), C2 + x), + Eq(Integral(1/sqrt(C1 - 2*_u*asin(_u) - 2*sqrt(1 - _u**2)), (_u, f(x))), C2 - x) + ], + 'simplify_flag': False, + 'XFAIL': ['2nd_nonlinear_autonomous_conserved_Integral'] + } + } + } + + +@_add_example_keys +def _get_examples_ode_sol_separable_reduced(): + df = f(x).diff(x) + return { + 'hint': "separable_reduced", + 'func': f(x), + 'examples':{ + 'separable_reduced_01': { + 'eq': x* df + f(x)* (1 / (x**2*f(x) - 1)), + 'sol': [Eq(log(x**2*f(x))/3 + log(x**2*f(x) - Rational(3, 2))/6, C1 + log(x))], + 'simplify_flag': False, + 'XFAIL': ['lie_group'], #It hangs. + }, + + #Note: 'separable_reduced_02' is referred in 'separable_reduced_11' + 'separable_reduced_02': { + 'eq': f(x).diff(x) + (f(x) / (x**4*f(x) - x)), + 'sol': [Eq(log(x**3*f(x))/4 + log(x**3*f(x) - Rational(4,3))/12, C1 + log(x))], + 'simplify_flag': False, + 'checkodesol_XFAIL':True, #It hangs for this. + }, + + 'separable_reduced_03': { + 'eq': x*df + f(x)*(x**2*f(x)), + 'sol': [Eq(log(x**2*f(x))/2 - log(x**2*f(x) - 2)/2, C1 + log(x))], + 'simplify_flag': False, + }, + + 'separable_reduced_04': { + 'eq': Eq(f(x).diff(x) + f(x)/x * (1 + (x**(S(2)/3)*f(x))**2), 0), + 'sol': [Eq(-3*log(x**(S(2)/3)*f(x)) + 3*log(3*x**(S(4)/3)*f(x)**2 + 1)/2, C1 + log(x))], + 'simplify_flag': False, + }, + + 'separable_reduced_05': { + 'eq': Eq(f(x).diff(x) + f(x)/x * (1 + (x*f(x))**2), 0), + 'sol': [Eq(f(x), -sqrt(2)*sqrt(1/(C1 + log(x)))/(2*x)),\ + Eq(f(x), sqrt(2)*sqrt(1/(C1 + log(x)))/(2*x))], + }, + + 'separable_reduced_06': { + 'eq': Eq(f(x).diff(x) + (x**4*f(x)**2 + x**2*f(x))*f(x)/(x*(x**6*f(x)**3 + x**4*f(x)**2)), 0), + 'sol': [Eq(f(x), C1 + 1/(2*x**2))], + }, + + 'separable_reduced_07': { + 'eq': Eq(f(x).diff(x) + (f(x)**2)*f(x)/(x), 0), + 'sol': [ + Eq(f(x), -sqrt(2)*sqrt(1/(C1 + log(x)))/2), + Eq(f(x), sqrt(2)*sqrt(1/(C1 + log(x)))/2) + ], + }, + + 'separable_reduced_08': { + 'eq': Eq(f(x).diff(x) + (f(x)+3)*f(x)/(x*(f(x)+2)), 0), + 'sol': [Eq(-log(f(x) + 3)/3 - 2*log(f(x))/3, C1 + log(x))], + 'simplify_flag': False, + 'XFAIL': ['lie_group'], #It hangs. + }, + + 'separable_reduced_09': { + 'eq': Eq(f(x).diff(x) + (f(x)+3)*f(x)/x, 0), + 'sol': [Eq(f(x), 3/(C1*x**3 - 1))], + }, + + 'separable_reduced_10': { + 'eq': Eq(f(x).diff(x) + (f(x)**2+f(x))*f(x)/(x), 0), + 'sol': [Eq(- log(x) - log(f(x) + 1) + log(f(x)) + 1/f(x), C1)], + 'XFAIL': ['lie_group'],#No algorithms are implemented to solve equation -C1 + x*(_y + 1)*exp(-1/_y)/_y + + }, + + # Equivalent to example_name 'separable_reduced_02'. Only difference is testing with simplify=True + 'separable_reduced_11': { + 'eq': f(x).diff(x) + (f(x) / (x**4*f(x) - x)), + 'sol': [Eq(f(x), -sqrt(2)*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)/6 +- sqrt(2)*sqrt(-3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) ++ 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 4/x**6 +- 4*sqrt(2)/(x**9*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)))/6 + 1/(3*x**3)), +Eq(f(x), -sqrt(2)*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)/6 ++ sqrt(2)*sqrt(-3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) ++ 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 4/x**6 +- 4*sqrt(2)/(x**9*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)))/6 + 1/(3*x**3)), +Eq(f(x), sqrt(2)*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)/6 +- sqrt(2)*sqrt(-3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) ++ 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) ++ 4/x**6 + 4*sqrt(2)/(x**9*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)))/6 + 1/(3*x**3)), +Eq(f(x), sqrt(2)*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) +- 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)/6 ++ sqrt(2)*sqrt(-3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) ++ x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 4/x**6 + 4*sqrt(2)/(x**9*sqrt(3*3**Rational(1,3)*(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) +- exp(12*C1)/x**6)**Rational(1,3) - 3*3**Rational(2,3)*exp(12*C1)/(sqrt((3*exp(12*C1) + x**(-12))*exp(24*C1)) - exp(12*C1)/x**6)**Rational(1,3) + 2/x**6)))/6 + 1/(3*x**3))], + 'checkodesol_XFAIL':True, #It hangs for this. + 'slow': True, + }, + + #These were from issue: https://github.com/sympy/sympy/issues/6247 + 'separable_reduced_12': { + 'eq': x**2*f(x)**2 + x*Derivative(f(x), x), + 'sol': [Eq(f(x), 2*C1/(C1*x**2 - 1))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_lie_group(): + a, b, c = symbols("a b c") + return { + 'hint': "lie_group", + 'func': f(x), + 'examples':{ + #Example 1-4 and 19-20 were from issue: https://github.com/sympy/sympy/issues/17322 + 'lie_group_01': { + 'eq': x*f(x).diff(x)*(f(x)+4) + (f(x)**2) -2*f(x)-2*x, + 'sol': [], + 'dsolve_too_slow': True, + 'checkodesol_too_slow': True, + }, + + 'lie_group_02': { + 'eq': x*f(x).diff(x)*(f(x)+4) + (f(x)**2) -2*f(x)-2*x, + 'sol': [], + 'dsolve_too_slow': True, + }, + + 'lie_group_03': { + 'eq': Eq(x**7*Derivative(f(x), x) + 5*x**3*f(x)**2 - (2*x**2 + 2)*f(x)**3, 0), + 'sol': [], + 'dsolve_too_slow': True, + }, + + 'lie_group_04': { + 'eq': f(x).diff(x) - (f(x) - x*log(x))**2/x**2 + log(x), + 'sol': [], + 'XFAIL': ['lie_group'], + }, + + 'lie_group_05': { + 'eq': f(x).diff(x)**2, + 'sol': [Eq(f(x), C1)], + 'XFAIL': ['factorable'], #It raises Not Implemented error + }, + + 'lie_group_06': { + 'eq': Eq(f(x).diff(x), x**2*f(x)), + 'sol': [Eq(f(x), C1*exp(x**3)**Rational(1, 3))], + }, + + 'lie_group_07': { + 'eq': f(x).diff(x) + a*f(x) - c*exp(b*x), + 'sol': [Eq(f(x), Piecewise(((-C1*(a + b) + c*exp(x*(a + b)))*exp(-a*x)/(a + b),\ + Ne(a, -b)), ((-C1 + c*x)*exp(-a*x), True)))], + }, + + 'lie_group_08': { + 'eq': f(x).diff(x) + 2*x*f(x) - x*exp(-x**2), + 'sol': [Eq(f(x), (C1 + x**2/2)*exp(-x**2))], + }, + + 'lie_group_09': { + 'eq': (1 + 2*x)*(f(x).diff(x)) + 2 - 4*exp(-f(x)), + 'sol': [Eq(f(x), log(C1/(2*x + 1) + 2))], + }, + + 'lie_group_10': { + 'eq': x**2*(f(x).diff(x)) - f(x) + x**2*exp(x - (1/x)), + 'sol': [Eq(f(x), (C1 - exp(x))*exp(-1/x))], + 'XFAIL': ['factorable'], #It raises Recursion Error (maixmum depth exceeded) + }, + + 'lie_group_11': { + 'eq': x**2*f(x)**2 + x*Derivative(f(x), x), + 'sol': [Eq(f(x), 2/(C1 + x**2))], + }, + + 'lie_group_12': { + 'eq': diff(f(x),x) + 2*x*f(x) - x*exp(-x**2), + 'sol': [Eq(f(x), exp(-x**2)*(C1 + x**2/2))], + }, + + 'lie_group_13': { + 'eq': diff(f(x),x) + f(x)*cos(x) - exp(2*x), + 'sol': [Eq(f(x), exp(-sin(x))*(C1 + Integral(exp(2*x)*exp(sin(x)), x)))], + }, + + 'lie_group_14': { + 'eq': diff(f(x),x) + f(x)*cos(x) - sin(2*x)/2, + 'sol': [Eq(f(x), C1*exp(-sin(x)) + sin(x) - 1)], + }, + + 'lie_group_15': { + 'eq': x*diff(f(x),x) + f(x) - x*sin(x), + 'sol': [Eq(f(x), (C1 - x*cos(x) + sin(x))/x)], + }, + + 'lie_group_16': { + 'eq': x*diff(f(x),x) - f(x) - x/log(x), + 'sol': [Eq(f(x), x*(C1 + log(log(x))))], + }, + + 'lie_group_17': { + 'eq': (f(x).diff(x)-f(x)) * (f(x).diff(x)+f(x)), + 'sol': [Eq(f(x), C1*exp(x)), Eq(f(x), C1*exp(-x))], + }, + + 'lie_group_18': { + 'eq': f(x).diff(x) * (f(x).diff(x) - f(x)), + 'sol': [Eq(f(x), C1*exp(x)), Eq(f(x), C1)], + }, + + 'lie_group_19': { + 'eq': (f(x).diff(x)-f(x)) * (f(x).diff(x)+f(x)), + 'sol': [Eq(f(x), C1*exp(-x)), Eq(f(x), C1*exp(x))], + }, + + 'lie_group_20': { + 'eq': f(x).diff(x)*(f(x).diff(x)+f(x)), + 'sol': [Eq(f(x), C1), Eq(f(x), C1*exp(-x))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_2nd_linear_airy(): + return { + 'hint': "2nd_linear_airy", + 'func': f(x), + 'examples':{ + '2nd_lin_airy_01': { + 'eq': f(x).diff(x, 2) - x*f(x), + 'sol': [Eq(f(x), C1*airyai(x) + C2*airybi(x))], + }, + + '2nd_lin_airy_02': { + 'eq': f(x).diff(x, 2) + 2*x*f(x), + 'sol': [Eq(f(x), C1*airyai(-2**(S(1)/3)*x) + C2*airybi(-2**(S(1)/3)*x))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_nth_linear_constant_coeff_homogeneous(): + # From Exercise 20, in Ordinary Differential Equations, + # Tenenbaum and Pollard, pg. 220 + a = Symbol('a', positive=True) + k = Symbol('k', real=True) + r1, r2, r3, r4, r5 = [rootof(x**5 + 11*x - 2, n) for n in range(5)] + r6, r7, r8, r9, r10 = [rootof(x**5 - 3*x + 1, n) for n in range(5)] + r11, r12, r13, r14, r15 = [rootof(x**5 - 100*x**3 + 1000*x + 1, n) for n in range(5)] + r16, r17, r18, r19, r20 = [rootof(x**5 - x**4 + 10, n) for n in range(5)] + r21, r22, r23, r24, r25 = [rootof(x**5 - x + 1, n) for n in range(5)] + E = exp(1) + return { + 'hint': "nth_linear_constant_coeff_homogeneous", + 'func': f(x), + 'examples':{ + 'lin_const_coeff_hom_01': { + 'eq': f(x).diff(x, 2) + 2*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-2*x))], + }, + + 'lin_const_coeff_hom_02': { + 'eq': f(x).diff(x, 2) - 3*f(x).diff(x) + 2*f(x), + 'sol': [Eq(f(x), (C1 + C2*exp(x))*exp(x))], + }, + + 'lin_const_coeff_hom_03': { + 'eq': f(x).diff(x, 2) - f(x), + 'sol': [Eq(f(x), C1*exp(-x) + C2*exp(x))], + }, + + 'lin_const_coeff_hom_04': { + 'eq': f(x).diff(x, 3) + f(x).diff(x, 2) - 6*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-3*x) + C3*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_05': { + 'eq': 6*f(x).diff(x, 2) - 11*f(x).diff(x) + 4*f(x), + 'sol': [Eq(f(x), C1*exp(x/2) + C2*exp(x*Rational(4, 3)))], + 'slow': True, + }, + + 'lin_const_coeff_hom_06': { + 'eq': Eq(f(x).diff(x, 2) + 2*f(x).diff(x) - f(x), 0), + 'sol': [Eq(f(x), C1*exp(x*(-1 + sqrt(2))) + C2*exp(-x*(sqrt(2) + 1)))], + 'slow': True, + }, + + 'lin_const_coeff_hom_07': { + 'eq': diff(f(x), x, 3) + diff(f(x), x, 2) - 10*diff(f(x), x) - 6*f(x), + 'sol': [Eq(f(x), C1*exp(3*x) + C3*exp(-x*(2 + sqrt(2))) + C2*exp(x*(-2 + sqrt(2))))], + 'slow': True, + }, + + 'lin_const_coeff_hom_08': { + 'eq': f(x).diff(x, 4) - f(x).diff(x, 3) - 4*f(x).diff(x, 2) + \ + 4*f(x).diff(x), + 'sol': [Eq(f(x), C1 + C2*exp(-2*x) + C3*exp(x) + C4*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_09': { + 'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 3) + f(x).diff(x, 2) - \ + 4*f(x).diff(x) - 2*f(x), + 'sol': [Eq(f(x), C3*exp(-x) + C4*exp(x) + (C1*exp(-sqrt(2)*x) + C2*exp(sqrt(2)*x))*exp(-2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_10': { + 'eq': f(x).diff(x, 4) - a**2*f(x), + 'sol': [Eq(f(x), C1*exp(-sqrt(a)*x) + C2*exp(sqrt(a)*x) + C3*sin(sqrt(a)*x) + C4*cos(sqrt(a)*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_11': { + 'eq': f(x).diff(x, 2) - 2*k*f(x).diff(x) - 2*f(x), + 'sol': [Eq(f(x), C1*exp(x*(k - sqrt(k**2 + 2))) + C2*exp(x*(k + sqrt(k**2 + 2))))], + 'slow': True, + }, + + 'lin_const_coeff_hom_12': { + 'eq': f(x).diff(x, 2) + 4*k*f(x).diff(x) - 12*k**2*f(x), + 'sol': [Eq(f(x), C1*exp(-6*k*x) + C2*exp(2*k*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_13': { + 'eq': f(x).diff(x, 4), + 'sol': [Eq(f(x), C1 + C2*x + C3*x**2 + C4*x**3)], + 'slow': True, + }, + + 'lin_const_coeff_hom_14': { + 'eq': f(x).diff(x, 2) + 4*f(x).diff(x) + 4*f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(-2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_15': { + 'eq': 3*f(x).diff(x, 3) + 5*f(x).diff(x, 2) + f(x).diff(x) - f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(-x) + C3*exp(x/3))], + 'slow': True, + }, + + 'lin_const_coeff_hom_16': { + 'eq': f(x).diff(x, 3) - 6*f(x).diff(x, 2) + 12*f(x).diff(x) - 8*f(x), + 'sol': [Eq(f(x), (C1 + x*(C2 + C3*x))*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_17': { + 'eq': f(x).diff(x, 2) - 2*a*f(x).diff(x) + a**2*f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(a*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_18': { + 'eq': f(x).diff(x, 4) + 3*f(x).diff(x, 3), + 'sol': [Eq(f(x), C1 + C2*x + C3*x**2 + C4*exp(-3*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_19': { + 'eq': f(x).diff(x, 4) - 2*f(x).diff(x, 2), + 'sol': [Eq(f(x), C1 + C2*x + C3*exp(-sqrt(2)*x) + C4*exp(sqrt(2)*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_20': { + 'eq': f(x).diff(x, 4) + 2*f(x).diff(x, 3) - 11*f(x).diff(x, 2) - \ + 12*f(x).diff(x) + 36*f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(-3*x) + (C3 + C4*x)*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_21': { + 'eq': 36*f(x).diff(x, 4) - 37*f(x).diff(x, 2) + 4*f(x).diff(x) + 5*f(x), + 'sol': [Eq(f(x), C1*exp(-x) + C2*exp(-x/3) + C3*exp(x/2) + C4*exp(x*Rational(5, 6)))], + 'slow': True, + }, + + 'lin_const_coeff_hom_22': { + 'eq': f(x).diff(x, 4) - 8*f(x).diff(x, 2) + 16*f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(-2*x) + (C3 + C4*x)*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_23': { + 'eq': f(x).diff(x, 2) - 2*f(x).diff(x) + 5*f(x), + 'sol': [Eq(f(x), (C1*sin(2*x) + C2*cos(2*x))*exp(x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_24': { + 'eq': f(x).diff(x, 2) - f(x).diff(x) + f(x), + 'sol': [Eq(f(x), (C1*sin(x*sqrt(3)/2) + C2*cos(x*sqrt(3)/2))*exp(x/2))], + 'slow': True, + }, + + 'lin_const_coeff_hom_25': { + 'eq': f(x).diff(x, 4) + 5*f(x).diff(x, 2) + 6*f(x), + 'sol': [Eq(f(x), + C1*sin(sqrt(2)*x) + C2*sin(sqrt(3)*x) + C3*cos(sqrt(2)*x) + C4*cos(sqrt(3)*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_26': { + 'eq': f(x).diff(x, 2) - 4*f(x).diff(x) + 20*f(x), + 'sol': [Eq(f(x), (C1*sin(4*x) + C2*cos(4*x))*exp(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_27': { + 'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 2) + 4*f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*sin(x*sqrt(2)) + (C3 + C4*x)*cos(x*sqrt(2)))], + 'slow': True, + }, + + 'lin_const_coeff_hom_28': { + 'eq': f(x).diff(x, 3) + 8*f(x), + 'sol': [Eq(f(x), (C1*sin(x*sqrt(3)) + C2*cos(x*sqrt(3)))*exp(x) + C3*exp(-2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_29': { + 'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 2), + 'sol': [Eq(f(x), C1 + C2*x + C3*sin(2*x) + C4*cos(2*x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_30': { + 'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x), + 'sol': [Eq(f(x), C1 + (C2 + C3*x)*sin(x) + (C4 + C5*x)*cos(x))], + 'slow': True, + }, + + 'lin_const_coeff_hom_31': { + 'eq': f(x).diff(x, 4) + f(x).diff(x, 2) + f(x), + 'sol': [Eq(f(x), (C1*sin(sqrt(3)*x/2) + C2*cos(sqrt(3)*x/2))*exp(-x/2) + + (C3*sin(sqrt(3)*x/2) + C4*cos(sqrt(3)*x/2))*exp(x/2))], + 'slow': True, + }, + + 'lin_const_coeff_hom_32': { + 'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 2) + f(x), + 'sol': [Eq(f(x), C1*sin(x*sqrt(-sqrt(3) + 2)) + C2*sin(x*sqrt(sqrt(3) + 2)) + + C3*cos(x*sqrt(-sqrt(3) + 2)) + C4*cos(x*sqrt(sqrt(3) + 2)))], + 'slow': True, + }, + + # One real root, two complex conjugate pairs + 'lin_const_coeff_hom_33': { + 'eq': f(x).diff(x, 5) + 11*f(x).diff(x) - 2*f(x), + 'sol': [Eq(f(x), + C5*exp(r1*x) + exp(re(r2)*x) * (C1*sin(im(r2)*x) + C2*cos(im(r2)*x)) + + exp(re(r4)*x) * (C3*sin(im(r4)*x) + C4*cos(im(r4)*x)))], + 'checkodesol_XFAIL':True, #It Hangs + }, + + # Three real roots, one complex conjugate pair + 'lin_const_coeff_hom_34': { + 'eq': f(x).diff(x,5) - 3*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), + C3*exp(r6*x) + C4*exp(r7*x) + C5*exp(r8*x) + + exp(re(r9)*x) * (C1*sin(im(r9)*x) + C2*cos(im(r9)*x)))], + 'checkodesol_XFAIL':True, #It Hangs + }, + + # Five distinct real roots + 'lin_const_coeff_hom_35': { + 'eq': f(x).diff(x,5) - 100*f(x).diff(x,3) + 1000*f(x).diff(x) + f(x), + 'sol': [Eq(f(x), C1*exp(r11*x) + C2*exp(r12*x) + C3*exp(r13*x) + C4*exp(r14*x) + C5*exp(r15*x))], + 'checkodesol_XFAIL':True, #It Hangs + }, + + # Rational root and unsolvable quintic + 'lin_const_coeff_hom_36': { + 'eq': f(x).diff(x, 6) - 6*f(x).diff(x, 5) + 5*f(x).diff(x, 4) + 10*f(x).diff(x) - 50 * f(x), + 'sol': [Eq(f(x), + C5*exp(5*x) + + C6*exp(x*r16) + + exp(re(r17)*x) * (C1*sin(im(r17)*x) + C2*cos(im(r17)*x)) + + exp(re(r19)*x) * (C3*sin(im(r19)*x) + C4*cos(im(r19)*x)))], + 'checkodesol_XFAIL':True, #It Hangs + }, + + # Five double roots (this is (x**5 - x + 1)**2) + 'lin_const_coeff_hom_37': { + 'eq': f(x).diff(x, 10) - 2*f(x).diff(x, 6) + 2*f(x).diff(x, 5) + + f(x).diff(x, 2) - 2*f(x).diff(x, 1) + f(x), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(x*r21) + (-((C3 + C4*x)*sin(x*im(r22))) + + (C5 + C6*x)*cos(x*im(r22)))*exp(x*re(r22)) + (-((C7 + C8*x)*sin(x*im(r24))) + + (C10*x + C9)*cos(x*im(r24)))*exp(x*re(r24)))], + 'checkodesol_XFAIL':True, #It Hangs + }, + + 'lin_const_coeff_hom_38': { + 'eq': Eq(sqrt(2) * f(x).diff(x,x,x) + f(x).diff(x), 0), + 'sol': [Eq(f(x), C1 + C2*sin(2**Rational(3, 4)*x/2) + C3*cos(2**Rational(3, 4)*x/2))], + }, + + 'lin_const_coeff_hom_39': { + 'eq': Eq(E * f(x).diff(x,x,x) + f(x).diff(x), 0), + 'sol': [Eq(f(x), C1 + C2*sin(x/sqrt(E)) + C3*cos(x/sqrt(E)))], + }, + + 'lin_const_coeff_hom_40': { + 'eq': Eq(pi * f(x).diff(x,x,x) + f(x).diff(x), 0), + 'sol': [Eq(f(x), C1 + C2*sin(x/sqrt(pi)) + C3*cos(x/sqrt(pi)))], + }, + + 'lin_const_coeff_hom_41': { + 'eq': Eq(I * f(x).diff(x,x,x) + f(x).diff(x), 0), + 'sol': [Eq(f(x), C1 + C2*exp(-sqrt(I)*x) + C3*exp(sqrt(I)*x))], + }, + + 'lin_const_coeff_hom_42': { + 'eq': f(x).diff(x, x) + y*f(x), + 'sol': [Eq(f(x), C1*exp(-x*sqrt(-y)) + C2*exp(x*sqrt(-y)))], + }, + + 'lin_const_coeff_hom_43': { + 'eq': Eq(9*f(x).diff(x, x) + f(x), 0), + 'sol': [Eq(f(x), C1*sin(x/3) + C2*cos(x/3))], + }, + + 'lin_const_coeff_hom_44': { + 'eq': Eq(9*f(x).diff(x, x), f(x)), + 'sol': [Eq(f(x), C1*exp(-x/3) + C2*exp(x/3))], + }, + + 'lin_const_coeff_hom_45': { + 'eq': Eq(f(x).diff(x, x) - 3*diff(f(x), x) + 2*f(x), 0), + 'sol': [Eq(f(x), (C1 + C2*exp(x))*exp(x))], + }, + + 'lin_const_coeff_hom_46': { + 'eq': Eq(f(x).diff(x, x) - 4*diff(f(x), x) + 4*f(x), 0), + 'sol': [Eq(f(x), (C1 + C2*x)*exp(2*x))], + }, + + # Type: 2nd order, constant coefficients (two real equal roots) + 'lin_const_coeff_hom_47': { + 'eq': Eq(f(x).diff(x, x) + 2*diff(f(x), x) + 3*f(x), 0), + 'sol': [Eq(f(x), (C1*sin(x*sqrt(2)) + C2*cos(x*sqrt(2)))*exp(-x))], + }, + + #These were from issue: https://github.com/sympy/sympy/issues/6247 + 'lin_const_coeff_hom_48': { + 'eq': f(x).diff(x, x) + 4*f(x), + 'sol': [Eq(f(x), C1*sin(2*x) + C2*cos(2*x))], + }, + } + } + + +@_add_example_keys +def _get_examples_ode_sol_1st_homogeneous_coeff_subs_dep_div_indep(): + return { + 'hint': "1st_homogeneous_coeff_subs_dep_div_indep", + 'func': f(x), + 'examples':{ + 'dep_div_indep_01': { + 'eq': f(x)/x*cos(f(x)/x) - (x/f(x)*sin(f(x)/x) + cos(f(x)/x))*f(x).diff(x), + 'sol': [Eq(log(x), C1 - log(f(x)*sin(f(x)/x)/x))], + 'slow': True + }, + + #indep_div_dep actually has a simpler solution for example 2 but it runs too slow. + 'dep_div_indep_02': { + 'eq': x*f(x).diff(x) - f(x) - x*sin(f(x)/x), + 'sol': [Eq(log(x), log(C1) + log(cos(f(x)/x) - 1)/2 - log(cos(f(x)/x) + 1)/2)], + 'simplify_flag':False, + }, + + 'dep_div_indep_03': { + 'eq': x*exp(f(x)/x) - f(x)*sin(f(x)/x) + x*sin(f(x)/x)*f(x).diff(x), + 'sol': [Eq(log(x), C1 + exp(-f(x)/x)*sin(f(x)/x)/2 + exp(-f(x)/x)*cos(f(x)/x)/2)], + 'slow': True + }, + + 'dep_div_indep_04': { + 'eq': f(x).diff(x) - f(x)/x + 1/sin(f(x)/x), + 'sol': [Eq(f(x), x*(-acos(C1 + log(x)) + 2*pi)), Eq(f(x), x*acos(C1 + log(x)))], + 'slow': True + }, + + # previous code was testing with these other solution: + # example5_solb = Eq(f(x), log(log(C1/x)**(-x))) + 'dep_div_indep_05': { + 'eq': x*exp(f(x)/x) + f(x) - x*f(x).diff(x), + 'sol': [Eq(f(x), log((1/(C1 - log(x)))**x))], + 'checkodesol_XFAIL':True, #(because of **x?) + }, + } + } + +@_add_example_keys +def _get_examples_ode_sol_linear_coefficients(): + return { + 'hint': "linear_coefficients", + 'func': f(x), + 'examples':{ + 'linear_coeff_01': { + 'eq': f(x).diff(x) + (3 + 2*f(x))/(x + 3), + 'sol': [Eq(f(x), C1/(x**2 + 6*x + 9) - Rational(3, 2))], + }, + } + } + +@_add_example_keys +def _get_examples_ode_sol_1st_homogeneous_coeff_best(): + return { + 'hint': "1st_homogeneous_coeff_best", + 'func': f(x), + 'examples':{ + # previous code was testing this with other solution: + # example1_solb = Eq(-f(x)/(1 + log(x/f(x))), C1) + '1st_homogeneous_coeff_best_01': { + 'eq': f(x) + (x*log(f(x)/x) - 2*x)*diff(f(x), x), + 'sol': [Eq(f(x), -exp(C1)*LambertW(-x*exp(-C1 + 1)))], + 'checkodesol_XFAIL':True, #(because of LambertW?) + }, + + '1st_homogeneous_coeff_best_02': { + 'eq': 2*f(x)*exp(x/f(x)) + f(x)*f(x).diff(x) - 2*x*exp(x/f(x))*f(x).diff(x), + 'sol': [Eq(log(f(x)), C1 - 2*exp(x/f(x)))], + }, + + # previous code was testing this with other solution: + # example3_solb = Eq(log(C1*x*sqrt(1/x)*sqrt(f(x))) + x**2/(2*f(x)**2), 0) + '1st_homogeneous_coeff_best_03': { + 'eq': 2*x**2*f(x) + f(x)**3 + (x*f(x)**2 - 2*x**3)*f(x).diff(x), + 'sol': [Eq(f(x), exp(2*C1 + LambertW(-2*x**4*exp(-4*C1))/2)/x)], + 'checkodesol_XFAIL':True, #(because of LambertW?) + }, + + '1st_homogeneous_coeff_best_04': { + 'eq': (x + sqrt(f(x)**2 - x*f(x)))*f(x).diff(x) - f(x), + 'sol': [Eq(log(f(x)), C1 - 2*sqrt(-x/f(x) + 1))], + 'slow': True, + }, + + '1st_homogeneous_coeff_best_05': { + 'eq': x + f(x) - (x - f(x))*f(x).diff(x), + 'sol': [Eq(log(x), C1 - log(sqrt(1 + f(x)**2/x**2)) + atan(f(x)/x))], + }, + + '1st_homogeneous_coeff_best_06': { + 'eq': x*f(x).diff(x) - f(x) - x*sin(f(x)/x), + 'sol': [Eq(f(x), 2*x*atan(C1*x))], + }, + + '1st_homogeneous_coeff_best_07': { + 'eq': x**2 + f(x)**2 - 2*x*f(x)*f(x).diff(x), + 'sol': [Eq(f(x), -sqrt(x*(C1 + x))), Eq(f(x), sqrt(x*(C1 + x)))], + }, + + '1st_homogeneous_coeff_best_08': { + 'eq': f(x)**2 + (x*sqrt(f(x)**2 - x**2) - x*f(x))*f(x).diff(x), + 'sol': [Eq(f(x), -C1*sqrt(-x/(x - 2*C1))), Eq(f(x), C1*sqrt(-x/(x - 2*C1)))], + 'checkodesol_XFAIL': True # solutions are valid in a range + }, + } + } + + +def _get_all_examples(): + all_examples = _get_examples_ode_sol_euler_homogeneous + \ + _get_examples_ode_sol_euler_undetermined_coeff + \ + _get_examples_ode_sol_euler_var_para + \ + _get_examples_ode_sol_factorable + \ + _get_examples_ode_sol_bernoulli + \ + _get_examples_ode_sol_nth_algebraic + \ + _get_examples_ode_sol_riccati + \ + _get_examples_ode_sol_1st_linear + \ + _get_examples_ode_sol_1st_exact + \ + _get_examples_ode_sol_almost_linear + \ + _get_examples_ode_sol_nth_order_reducible + \ + _get_examples_ode_sol_nth_linear_undetermined_coefficients + \ + _get_examples_ode_sol_liouville + \ + _get_examples_ode_sol_separable + \ + _get_examples_ode_sol_1st_rational_riccati + \ + _get_examples_ode_sol_nth_linear_var_of_parameters + \ + _get_examples_ode_sol_2nd_linear_bessel + \ + _get_examples_ode_sol_2nd_2F1_hypergeometric + \ + _get_examples_ode_sol_2nd_nonlinear_autonomous_conserved + \ + _get_examples_ode_sol_separable_reduced + \ + _get_examples_ode_sol_lie_group + \ + _get_examples_ode_sol_2nd_linear_airy + \ + _get_examples_ode_sol_nth_linear_constant_coeff_homogeneous +\ + _get_examples_ode_sol_1st_homogeneous_coeff_best +\ + _get_examples_ode_sol_1st_homogeneous_coeff_subs_dep_div_indep +\ + _get_examples_ode_sol_linear_coefficients + + return all_examples diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_subscheck.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_subscheck.py new file mode 100644 index 0000000000000000000000000000000000000000..799c2854e878208721b600767de350cda08cd7e5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_subscheck.py @@ -0,0 +1,203 @@ +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.error_functions import (Ei, erf, erfi) +from sympy.integrals.integrals import Integral + +from sympy.solvers.ode.subscheck import checkodesol, checksysodesol + +from sympy.functions import besselj, bessely + +from sympy.testing.pytest import raises, slow + + +C0, C1, C2, C3, C4 = symbols('C0:5') +u, x, y, z = symbols('u,x:z', real=True) +f = Function('f') +g = Function('g') +h = Function('h') + + +@slow +def test_checkodesol(): + # For the most part, checkodesol is well tested in the tests below. + # These tests only handle cases not checked below. + raises(ValueError, lambda: checkodesol(f(x, y).diff(x), Eq(f(x, y), x))) + raises(ValueError, lambda: checkodesol(f(x).diff(x), Eq(f(x, y), + x), f(x, y))) + assert checkodesol(f(x).diff(x), Eq(f(x, y), x)) == \ + (False, -f(x).diff(x) + f(x, y).diff(x) - 1) + assert checkodesol(f(x).diff(x), Eq(f(x), x)) is not True + assert checkodesol(f(x).diff(x), Eq(f(x), x)) == (False, 1) + sol1 = Eq(f(x)**5 + 11*f(x) - 2*f(x) + x, 0) + assert checkodesol(diff(sol1.lhs, x), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x)*exp(f(x)), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x, 2), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x, 2)*exp(f(x)), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x, 3), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x, 3)*exp(f(x)), sol1) == (True, 0) + assert checkodesol(diff(sol1.lhs, x, 3), Eq(f(x), x*log(x))) == \ + (False, 60*x**4*((log(x) + 1)**2 + log(x))*( + log(x) + 1)*log(x)**2 - 5*x**4*log(x)**4 - 9) + assert checkodesol(diff(exp(f(x)) + x, x)*x, Eq(exp(f(x)) + x, 0)) == \ + (True, 0) + assert checkodesol(diff(exp(f(x)) + x, x)*x, Eq(exp(f(x)) + x, 0), + solve_for_func=False) == (True, 0) + assert checkodesol(f(x).diff(x, 2), [Eq(f(x), C1 + C2*x), + Eq(f(x), C2 + C1*x), Eq(f(x), C1*x + C2*x**2)]) == \ + [(True, 0), (True, 0), (False, C2)] + assert checkodesol(f(x).diff(x, 2), {Eq(f(x), C1 + C2*x), + Eq(f(x), C2 + C1*x), Eq(f(x), C1*x + C2*x**2)}) == \ + {(True, 0), (True, 0), (False, C2)} + assert checkodesol(f(x).diff(x) - 1/f(x)/2, Eq(f(x)**2, x)) == \ + [(True, 0), (True, 0)] + assert checkodesol(f(x).diff(x) - f(x), Eq(C1*exp(x), f(x))) == (True, 0) + # Based on test_1st_homogeneous_coeff_ode2_eq3sol. Make sure that + # checkodesol tries back substituting f(x) when it can. + eq3 = x*exp(f(x)/x) + f(x) - x*f(x).diff(x) + sol3 = Eq(f(x), log(log(C1/x)**(-x))) + assert not checkodesol(eq3, sol3)[1].has(f(x)) + # This case was failing intermittently depending on hash-seed: + eqn = Eq(Derivative(x*Derivative(f(x), x), x)/x, exp(x)) + sol = Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x)) + assert checkodesol(eqn, sol, order=2, solve_for_func=False)[0] + eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (2*x**2 +25)*f(x) + sol = Eq(f(x), C1*besselj(5*I, sqrt(2)*x) + C2*bessely(5*I, sqrt(2)*x)) + assert checkodesol(eq, sol) == (True, 0) + + eqs = [Eq(f(x).diff(x), f(x) + g(x)), Eq(g(x).diff(x), f(x) + g(x))] + sol = [Eq(f(x), -C1 + C2*exp(2*x)), Eq(g(x), C1 + C2*exp(2*x))] + assert checkodesol(eqs, sol) == (True, [0, 0]) + + +def test_checksysodesol(): + x, y, z = symbols('x, y, z', cls=Function) + t = Symbol('t') + eq = (Eq(diff(x(t),t), 9*y(t)), Eq(diff(y(t),t), 12*x(t))) + sol = [Eq(x(t), 9*C1*exp(-6*sqrt(3)*t) + 9*C2*exp(6*sqrt(3)*t)), \ + Eq(y(t), -6*sqrt(3)*C1*exp(-6*sqrt(3)*t) + 6*sqrt(3)*C2*exp(6*sqrt(3)*t))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), 2*x(t) + 4*y(t)), Eq(diff(y(t),t), 12*x(t) + 41*y(t))) + sol = [Eq(x(t), 4*C1*exp(t*(-sqrt(1713)/2 + Rational(43, 2))) + 4*C2*exp(t*(sqrt(1713)/2 + \ + Rational(43, 2)))), Eq(y(t), C1*(-sqrt(1713)/2 + Rational(39, 2))*exp(t*(-sqrt(1713)/2 + \ + Rational(43, 2))) + C2*(Rational(39, 2) + sqrt(1713)/2)*exp(t*(sqrt(1713)/2 + Rational(43, 2))))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), x(t) + y(t)), Eq(diff(y(t),t), -2*x(t) + 2*y(t))) + sol = [Eq(x(t), (C1*sin(sqrt(7)*t/2) + C2*cos(sqrt(7)*t/2))*exp(t*Rational(3, 2))), \ + Eq(y(t), ((C1/2 - sqrt(7)*C2/2)*sin(sqrt(7)*t/2) + (sqrt(7)*C1/2 + \ + C2/2)*cos(sqrt(7)*t/2))*exp(t*Rational(3, 2)))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), x(t) + y(t) + 9), Eq(diff(y(t),t), 2*x(t) + 5*y(t) + 23)) + sol = [Eq(x(t), C1*exp(t*(-sqrt(6) + 3)) + C2*exp(t*(sqrt(6) + 3)) - \ + Rational(22, 3)), Eq(y(t), C1*(-sqrt(6) + 2)*exp(t*(-sqrt(6) + 3)) + C2*(2 + \ + sqrt(6))*exp(t*(sqrt(6) + 3)) - Rational(5, 3))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), x(t) + y(t) + 81), Eq(diff(y(t),t), -2*x(t) + y(t) + 23)) + sol = [Eq(x(t), (C1*sin(sqrt(2)*t) + C2*cos(sqrt(2)*t))*exp(t) - Rational(58, 3)), \ + Eq(y(t), (sqrt(2)*C1*cos(sqrt(2)*t) - sqrt(2)*C2*sin(sqrt(2)*t))*exp(t) - Rational(185, 3))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), 5*t*x(t) + 2*y(t)), Eq(diff(y(t),t), 2*x(t) + 5*t*y(t))) + sol = [Eq(x(t), (C1*exp(Integral(2, t).doit()) + C2*exp(-(Integral(2, t)).doit()))*\ + exp((Integral(5*t, t)).doit())), Eq(y(t), (C1*exp((Integral(2, t)).doit()) - \ + C2*exp(-(Integral(2, t)).doit()))*exp((Integral(5*t, t)).doit()))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t))) + sol = [Eq(x(t), (C1*cos((Integral(t**2, t)).doit()) + C2*sin((Integral(t**2, t)).doit()))*\ + exp((Integral(5*t, t)).doit())), Eq(y(t), (-C1*sin((Integral(t**2, t)).doit()) + \ + C2*cos((Integral(t**2, t)).doit()))*exp((Integral(5*t, t)).doit()))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + (5*t+9*t**2)*y(t))) + sol = [Eq(x(t), (C1*exp((-sqrt(77)/2 + Rational(9, 2))*(Integral(t**2, t)).doit()) + \ + C2*exp((sqrt(77)/2 + Rational(9, 2))*(Integral(t**2, t)).doit()))*exp((Integral(5*t, t)).doit())), \ + Eq(y(t), (C1*(-sqrt(77)/2 + Rational(9, 2))*exp((-sqrt(77)/2 + Rational(9, 2))*(Integral(t**2, t)).doit()) + \ + C2*(sqrt(77)/2 + Rational(9, 2))*exp((sqrt(77)/2 + Rational(9, 2))*(Integral(t**2, t)).doit()))*exp((Integral(5*t, t)).doit()))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t,t), 5*x(t) + 43*y(t)), Eq(diff(y(t),t,t), x(t) + 9*y(t))) + root0 = -sqrt(-sqrt(47) + 7) + root1 = sqrt(-sqrt(47) + 7) + root2 = -sqrt(sqrt(47) + 7) + root3 = sqrt(sqrt(47) + 7) + sol = [Eq(x(t), 43*C1*exp(t*root0) + 43*C2*exp(t*root1) + 43*C3*exp(t*root2) + 43*C4*exp(t*root3)), \ + Eq(y(t), C1*(root0**2 - 5)*exp(t*root0) + C2*(root1**2 - 5)*exp(t*root1) + \ + C3*(root2**2 - 5)*exp(t*root2) + C4*(root3**2 - 5)*exp(t*root3))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t,t), 8*x(t)+3*y(t)+31), Eq(diff(y(t),t,t), 9*x(t)+7*y(t)+12)) + root0 = -sqrt(-sqrt(109)/2 + Rational(15, 2)) + root1 = sqrt(-sqrt(109)/2 + Rational(15, 2)) + root2 = -sqrt(sqrt(109)/2 + Rational(15, 2)) + root3 = sqrt(sqrt(109)/2 + Rational(15, 2)) + sol = [Eq(x(t), 3*C1*exp(t*root0) + 3*C2*exp(t*root1) + 3*C3*exp(t*root2) + 3*C4*exp(t*root3) - Rational(181, 29)), \ + Eq(y(t), C1*(root0**2 - 8)*exp(t*root0) + C2*(root1**2 - 8)*exp(t*root1) + \ + C3*(root2**2 - 8)*exp(t*root2) + C4*(root3**2 - 8)*exp(t*root3) + Rational(183, 29))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t,t) - 9*diff(y(t),t) + 7*x(t),0), Eq(diff(y(t),t,t) + 9*diff(x(t),t) + 7*y(t),0)) + sol = [Eq(x(t), C1*cos(t*(Rational(9, 2) + sqrt(109)/2)) + C2*sin(t*(Rational(9, 2) + sqrt(109)/2)) + \ + C3*cos(t*(-sqrt(109)/2 + Rational(9, 2))) + C4*sin(t*(-sqrt(109)/2 + Rational(9, 2)))), Eq(y(t), -C1*sin(t*(Rational(9, 2) + sqrt(109)/2)) \ + + C2*cos(t*(Rational(9, 2) + sqrt(109)/2)) - C3*sin(t*(-sqrt(109)/2 + Rational(9, 2))) + C4*cos(t*(-sqrt(109)/2 + Rational(9, 2))))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t,t), 9*t*diff(y(t),t)-9*y(t)), Eq(diff(y(t),t,t),7*t*diff(x(t),t)-7*x(t))) + I1 = sqrt(6)*7**Rational(1, 4)*sqrt(pi)*erfi(sqrt(6)*7**Rational(1, 4)*t/2)/2 - exp(3*sqrt(7)*t**2/2)/t + I2 = -sqrt(6)*7**Rational(1, 4)*sqrt(pi)*erf(sqrt(6)*7**Rational(1, 4)*t/2)/2 - exp(-3*sqrt(7)*t**2/2)/t + sol = [Eq(x(t), C3*t + t*(9*C1*I1 + 9*C2*I2)), Eq(y(t), C4*t + t*(3*sqrt(7)*C1*I1 - 3*sqrt(7)*C2*I2))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), 21*x(t)), Eq(diff(y(t),t), 17*x(t)+3*y(t)), Eq(diff(z(t),t), 5*x(t)+7*y(t)+9*z(t))) + sol = [Eq(x(t), C1*exp(21*t)), Eq(y(t), 17*C1*exp(21*t)/18 + C2*exp(3*t)), \ + Eq(z(t), 209*C1*exp(21*t)/216 - 7*C2*exp(3*t)/6 + C3*exp(9*t))] + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + eq = (Eq(diff(x(t),t),3*y(t)-11*z(t)),Eq(diff(y(t),t),7*z(t)-3*x(t)),Eq(diff(z(t),t),11*x(t)-7*y(t))) + sol = [Eq(x(t), 7*C0 + sqrt(179)*C1*cos(sqrt(179)*t) + (77*C1/3 + 130*C2/3)*sin(sqrt(179)*t)), \ + Eq(y(t), 11*C0 + sqrt(179)*C2*cos(sqrt(179)*t) + (-58*C1/3 - 77*C2/3)*sin(sqrt(179)*t)), \ + Eq(z(t), 3*C0 + sqrt(179)*(-7*C1/3 - 11*C2/3)*cos(sqrt(179)*t) + (11*C1 - 7*C2)*sin(sqrt(179)*t))] + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + eq = (Eq(3*diff(x(t),t),4*5*(y(t)-z(t))),Eq(4*diff(y(t),t),3*5*(z(t)-x(t))),Eq(5*diff(z(t),t),3*4*(x(t)-y(t)))) + sol = [Eq(x(t), C0 + 5*sqrt(2)*C1*cos(5*sqrt(2)*t) + (12*C1/5 + 164*C2/15)*sin(5*sqrt(2)*t)), \ + Eq(y(t), C0 + 5*sqrt(2)*C2*cos(5*sqrt(2)*t) + (-51*C1/10 - 12*C2/5)*sin(5*sqrt(2)*t)), \ + Eq(z(t), C0 + 5*sqrt(2)*(-9*C1/25 - 16*C2/25)*cos(5*sqrt(2)*t) + (12*C1/5 - 12*C2/5)*sin(5*sqrt(2)*t))] + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + eq = (Eq(diff(x(t),t),4*x(t) - z(t)),Eq(diff(y(t),t),2*x(t)+2*y(t)-z(t)),Eq(diff(z(t),t),3*x(t)+y(t))) + sol = [Eq(x(t), C1*exp(2*t) + C2*t*exp(2*t) + C2*exp(2*t) + C3*t**2*exp(2*t)/2 + C3*t*exp(2*t) + C3*exp(2*t)), \ + Eq(y(t), C1*exp(2*t) + C2*t*exp(2*t) + C2*exp(2*t) + C3*t**2*exp(2*t)/2 + C3*t*exp(2*t)), \ + Eq(z(t), 2*C1*exp(2*t) + 2*C2*t*exp(2*t) + C2*exp(2*t) + C3*t**2*exp(2*t) + C3*t*exp(2*t) + C3*exp(2*t))] + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + eq = (Eq(diff(x(t),t),4*x(t) - y(t) - 2*z(t)),Eq(diff(y(t),t),2*x(t) + y(t)- 2*z(t)),Eq(diff(z(t),t),5*x(t)-3*z(t))) + sol = [Eq(x(t), C1*exp(2*t) + C2*(-sin(t) + 3*cos(t)) + C3*(3*sin(t) + cos(t))), \ + Eq(y(t), C2*(-sin(t) + 3*cos(t)) + C3*(3*sin(t) + cos(t))), Eq(z(t), C1*exp(2*t) + 5*C2*cos(t) + 5*C3*sin(t))] + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + eq = (Eq(diff(x(t),t),x(t)*y(t)**3), Eq(diff(y(t),t),y(t)**5)) + sol = [Eq(x(t), C1*exp((-1/(4*C2 + 4*t))**(Rational(-1, 4)))), Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), C1*exp(-1/(-1/(4*C2 + 4*t))**Rational(1, 4))), Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), C1*exp(-I/(-1/(4*C2 + 4*t))**Rational(1, 4))), Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), C1*exp(I/(-1/(4*C2 + 4*t))**Rational(1, 4))), Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(diff(x(t),t), exp(3*x(t))*y(t)**3),Eq(diff(y(t),t), y(t)**5)) + sol = [Eq(x(t), -log(C1 - 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), -log(C1 + 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), -log(C1 + 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)), \ + Eq(x(t), -log(C1 - 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + eq = (Eq(x(t),t*diff(x(t),t)+diff(x(t),t)*diff(y(t),t)), Eq(y(t),t*diff(y(t),t)+diff(y(t),t)**2)) + sol = {Eq(x(t), C1*C2 + C1*t), Eq(y(t), C2**2 + C2*t)} + assert checksysodesol(eq, sol) == (True, [0, 0]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_systems.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_systems.py new file mode 100644 index 0000000000000000000000000000000000000000..9d206129dfcf38c7b8c2e0ab42bd875003253f35 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/ode/tests/test_systems.py @@ -0,0 +1,2544 @@ +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.hyperbolic import sinh +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.matrices.dense import Matrix +from sympy.core.containers import Tuple +from sympy.functions import exp, cos, sin, log, Ci, Si, erf, erfi +from sympy.matrices import dotprodsimp, NonSquareMatrixError +from sympy.solvers.ode import dsolve +from sympy.solvers.ode.ode import constant_renumber +from sympy.solvers.ode.subscheck import checksysodesol +from sympy.solvers.ode.systems import (_classify_linear_system, linear_ode_to_matrix, + ODEOrderError, ODENonlinearError, _simpsol, + _is_commutative_anti_derivative, linodesolve, + canonical_odes, dsolve_system, _component_division, + _eqs2dict, _dict2graph) +from sympy.functions import airyai, airybi +from sympy.integrals.integrals import Integral +from sympy.simplify.ratsimp import ratsimp +from sympy.testing.pytest import raises, slow, tooslow, XFAIL + + +C0, C1, C2, C3, C4, C5, C6, C7, C8, C9, C10 = symbols('C0:11') +x = symbols('x') +f = Function('f') +g = Function('g') +h = Function('h') + + +def test_linear_ode_to_matrix(): + f, g, h = symbols("f, g, h", cls=Function) + t = Symbol("t") + funcs = [f(t), g(t), h(t)] + f1 = f(t).diff(t) + g1 = g(t).diff(t) + h1 = h(t).diff(t) + f2 = f(t).diff(t, 2) + g2 = g(t).diff(t, 2) + h2 = h(t).diff(t, 2) + + eqs_1 = [Eq(f1, g(t)), Eq(g1, f(t))] + sol_1 = ([Matrix([[1, 0], [0, 1]]), Matrix([[ 0, 1], [1, 0]])], Matrix([[0],[0]])) + assert linear_ode_to_matrix(eqs_1, funcs[:-1], t, 1) == sol_1 + + eqs_2 = [Eq(f1, f(t) + 2*g(t)), Eq(g1, h(t)), Eq(h1, g(t) + h(t) + f(t))] + sol_2 = ([Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]]), Matrix([[1, 2, 0], [ 0, 0, 1], [1, 1, 1]])], + Matrix([[0], [0], [0]])) + assert linear_ode_to_matrix(eqs_2, funcs, t, 1) == sol_2 + + eqs_3 = [Eq(2*f1 + 3*h1, f(t) + g(t)), Eq(4*h1 + 5*g1, f(t) + h(t)), Eq(5*f1 + 4*g1, g(t) + h(t))] + sol_3 = ([Matrix([[2, 0, 3], [0, 5, 4], [5, 4, 0]]), Matrix([[1, 1, 0], [1, 0, 1], [0, 1, 1]])], + Matrix([[0], [0], [0]])) + assert linear_ode_to_matrix(eqs_3, funcs, t, 1) == sol_3 + + eqs_4 = [Eq(f2 + h(t), f1 + g(t)), Eq(2*h2 + g2 + g1 + g(t), 0), Eq(3*h1, 4)] + sol_4 = ([Matrix([[1, 0, 0], [0, 1, 2], [0, 0, 0]]), Matrix([[1, 0, 0], [0, -1, 0], [0, 0, -3]]), + Matrix([[0, 1, -1], [0, -1, 0], [0, 0, 0]])], Matrix([[0], [0], [4]])) + assert linear_ode_to_matrix(eqs_4, funcs, t, 2) == sol_4 + + eqs_5 = [Eq(f2, g(t)), Eq(f1 + g1, f(t))] + raises(ODEOrderError, lambda: linear_ode_to_matrix(eqs_5, funcs[:-1], t, 1)) + + eqs_6 = [Eq(f1, f(t)**2), Eq(g1, f(t) + g(t))] + raises(ODENonlinearError, lambda: linear_ode_to_matrix(eqs_6, funcs[:-1], t, 1)) + + +def test__classify_linear_system(): + x, y, z, w = symbols('x, y, z, w', cls=Function) + t, k, l = symbols('t k l') + x1 = diff(x(t), t) + y1 = diff(y(t), t) + z1 = diff(z(t), t) + w1 = diff(w(t), t) + x2 = diff(x(t), t, t) + y2 = diff(y(t), t, t) + funcs = [x(t), y(t)] + funcs_2 = funcs + [z(t), w(t)] + + eqs_1 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * t * x(t) + 3 * y(t) + t)) + assert _classify_linear_system(eqs_1, funcs, t) is None + + eqs_2 = (5 * (x1**2) + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * t * x(t) + 3 * y(t) + t)) + sol2 = {'is_implicit': True, + 'canon_eqs': [[Eq(Derivative(x(t), t), -sqrt(-12*x(t)/5 + 6*y(t)/5)), + Eq(Derivative(y(t), t), 11*t*x(t)/2 - t/2 - 3*y(t)/2)], + [Eq(Derivative(x(t), t), sqrt(-12*x(t)/5 + 6*y(t)/5)), + Eq(Derivative(y(t), t), 11*t*x(t)/2 - t/2 - 3*y(t)/2)]]} + assert _classify_linear_system(eqs_2, funcs, t) == sol2 + + eqs_2_1 = [Eq(Derivative(x(t), t), -sqrt(-12*x(t)/5 + 6*y(t)/5)), + Eq(Derivative(y(t), t), 11*t*x(t)/2 - t/2 - 3*y(t)/2)] + assert _classify_linear_system(eqs_2_1, funcs, t) is None + + eqs_2_2 = [Eq(Derivative(x(t), t), sqrt(-12*x(t)/5 + 6*y(t)/5)), + Eq(Derivative(y(t), t), 11*t*x(t)/2 - t/2 - 3*y(t)/2)] + assert _classify_linear_system(eqs_2_2, funcs, t) is None + + eqs_3 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * x(t) + 3 * y(t)), (5 * w1 + z(t)), (z1 + w(t))) + answer_3 = {'no_of_equation': 4, + 'eq': (12*x(t) - 6*y(t) + 5*Derivative(x(t), t), + -11*x(t) + 3*y(t) + 2*Derivative(y(t), t), + z(t) + 5*Derivative(w(t), t), + w(t) + Derivative(z(t), t)), + 'func': [x(t), y(t), z(t), w(t)], + 'order': {x(t): 1, y(t): 1, z(t): 1, w(t): 1}, + 'is_linear': True, + 'is_constant': True, + 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [Rational(12, 5), Rational(-6, 5), 0, 0], + [Rational(-11, 2), Rational(3, 2), 0, 0], + [0, 0, 0, 1], + [0, 0, Rational(1, 5), 0]]), + 'type_of_equation': 'type1', + 'is_general': True} + assert _classify_linear_system(eqs_3, funcs_2, t) == answer_3 + + eqs_4 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * x(t) + 3 * y(t)), (z1 - w(t)), (w1 - z(t))) + answer_4 = {'no_of_equation': 4, + 'eq': (12 * x(t) - 6 * y(t) + 5 * Derivative(x(t), t), + -11 * x(t) + 3 * y(t) + 2 * Derivative(y(t), t), + -w(t) + Derivative(z(t), t), + -z(t) + Derivative(w(t), t)), + 'func': [x(t), y(t), z(t), w(t)], + 'order': {x(t): 1, y(t): 1, z(t): 1, w(t): 1}, + 'is_linear': True, + 'is_constant': True, + 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [Rational(12, 5), Rational(-6, 5), 0, 0], + [Rational(-11, 2), Rational(3, 2), 0, 0], + [0, 0, 0, -1], + [0, 0, -1, 0]]), + 'type_of_equation': 'type1', + 'is_general': True} + assert _classify_linear_system(eqs_4, funcs_2, t) == answer_4 + + eqs_5 = (5*x1 + 12*x(t) - 6*(y(t)) + x2, (2*y1 - 11*x(t) + 3*y(t)), (z1 - w(t)), (w1 - z(t))) + answer_5 = {'no_of_equation': 4, 'eq': (12*x(t) - 6*y(t) + 5*Derivative(x(t), t) + Derivative(x(t), (t, 2)), + -11*x(t) + 3*y(t) + 2*Derivative(y(t), t), -w(t) + Derivative(z(t), t), -z(t) + Derivative(w(t), + t)), 'func': [x(t), y(t), z(t), w(t)], 'order': {x(t): 2, y(t): 1, z(t): 1, w(t): 1}, 'is_linear': + True, 'is_homogeneous': True, 'is_general': True, 'type_of_equation': 'type0', 'is_higher_order': True} + assert _classify_linear_system(eqs_5, funcs_2, t) == answer_5 + + eqs_6 = (Eq(x1, 3*y(t) - 11*z(t)), Eq(y1, 7*z(t) - 3*x(t)), Eq(z1, 11*x(t) - 7*y(t))) + answer_6 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 3*y(t) - 11*z(t)), Eq(Derivative(y(t), t), -3*x(t) + 7*z(t)), + Eq(Derivative(z(t), t), 11*x(t) - 7*y(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, + 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [ 0, -3, 11], + [ 3, 0, -7], + [-11, 7, 0]]), + 'type_of_equation': 'type1', 'is_general': True} + + assert _classify_linear_system(eqs_6, funcs_2[:-1], t) == answer_6 + + eqs_7 = (Eq(x1, y(t)), Eq(y1, x(t))) + answer_7 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t))), + 'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True, + 'is_homogeneous': True, 'func_coeff': -Matrix([ + [ 0, -1], + [-1, 0]]), + 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eqs_7, funcs, t) == answer_7 + + eqs_8 = (Eq(x1, 21*x(t)), Eq(y1, 17*x(t) + 3*y(t)), Eq(z1, 5*x(t) + 7*y(t) + 9*z(t))) + answer_8 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 21*x(t)), Eq(Derivative(y(t), t), 17*x(t) + 3*y(t)), + Eq(Derivative(z(t), t), 5*x(t) + 7*y(t) + 9*z(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, + 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [-21, 0, 0], + [-17, -3, 0], + [ -5, -7, -9]]), + 'type_of_equation': 'type1', 'is_general': True} + + assert _classify_linear_system(eqs_8, funcs_2[:-1], t) == answer_8 + + eqs_9 = (Eq(x1, 4*x(t) + 5*y(t) + 2*z(t)), Eq(y1, x(t) + 13*y(t) + 9*z(t)), Eq(z1, 32*x(t) + 41*y(t) + 11*z(t))) + answer_9 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 4*x(t) + 5*y(t) + 2*z(t)), + Eq(Derivative(y(t), t), x(t) + 13*y(t) + 9*z(t)), Eq(Derivative(z(t), t), 32*x(t) + 41*y(t) + 11*z(t))), + 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, + 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [ -4, -5, -2], + [ -1, -13, -9], + [-32, -41, -11]]), + 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eqs_9, funcs_2[:-1], t) == answer_9 + + eqs_10 = (Eq(3*x1, 4*5*(y(t) - z(t))), Eq(4*y1, 3*5*(z(t) - x(t))), Eq(5*z1, 3*4*(x(t) - y(t)))) + answer_10 = {'no_of_equation': 3, 'eq': (Eq(3*Derivative(x(t), t), 20*y(t) - 20*z(t)), + Eq(4*Derivative(y(t), t), -15*x(t) + 15*z(t)), Eq(5*Derivative(z(t), t), 12*x(t) - 12*y(t))), + 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, + 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [ 0, Rational(-20, 3), Rational(20, 3)], + [Rational(15, 4), 0, Rational(-15, 4)], + [Rational(-12, 5), Rational(12, 5), 0]]), + 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eqs_10, funcs_2[:-1], t) == answer_10 + + eq11 = (Eq(x1, 3*y(t) - 11*z(t)), Eq(y1, 7*z(t) - 3*x(t)), Eq(z1, 11*x(t) - 7*y(t))) + sol11 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 3*y(t) - 11*z(t)), Eq(Derivative(y(t), t), -3*x(t) + 7*z(t)), + Eq(Derivative(z(t), t), 11*x(t) - 7*y(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, + 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, 'func_coeff': -Matrix([ + [ 0, -3, 11], [ 3, 0, -7], [-11, 7, 0]]), 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eq11, funcs_2[:-1], t) == sol11 + + eq12 = (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t))) + sol12 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t))), + 'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True, + 'is_homogeneous': True, 'func_coeff': -Matrix([ + [0, -1], + [-1, 0]]), 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eq12, [x(t), y(t)], t) == sol12 + + eq13 = (Eq(Derivative(x(t), t), 21*x(t)), Eq(Derivative(y(t), t), 17*x(t) + 3*y(t)), + Eq(Derivative(z(t), t), 5*x(t) + 7*y(t) + 9*z(t))) + sol13 = {'no_of_equation': 3, 'eq': ( + Eq(Derivative(x(t), t), 21 * x(t)), Eq(Derivative(y(t), t), 17 * x(t) + 3 * y(t)), + Eq(Derivative(z(t), t), 5 * x(t) + 7 * y(t) + 9 * z(t))), 'func': [x(t), y(t), z(t)], + 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [-21, 0, 0], + [-17, -3, 0], + [-5, -7, -9]]), 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eq13, [x(t), y(t), z(t)], t) == sol13 + + eq14 = ( + Eq(Derivative(x(t), t), 4*x(t) + 5*y(t) + 2*z(t)), Eq(Derivative(y(t), t), x(t) + 13*y(t) + 9*z(t)), + Eq(Derivative(z(t), t), 32*x(t) + 41*y(t) + 11*z(t))) + sol14 = {'no_of_equation': 3, 'eq': ( + Eq(Derivative(x(t), t), 4 * x(t) + 5 * y(t) + 2 * z(t)), Eq(Derivative(y(t), t), x(t) + 13 * y(t) + 9 * z(t)), + Eq(Derivative(z(t), t), 32 * x(t) + 41 * y(t) + 11 * z(t))), 'func': [x(t), y(t), z(t)], + 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [-4, -5, -2], + [-1, -13, -9], + [-32, -41, -11]]), 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eq14, [x(t), y(t), z(t)], t) == sol14 + + eq15 = (Eq(3*Derivative(x(t), t), 20*y(t) - 20*z(t)), Eq(4*Derivative(y(t), t), -15*x(t) + 15*z(t)), + Eq(5*Derivative(z(t), t), 12*x(t) - 12*y(t))) + sol15 = {'no_of_equation': 3, 'eq': ( + Eq(3 * Derivative(x(t), t), 20 * y(t) - 20 * z(t)), Eq(4 * Derivative(y(t), t), -15 * x(t) + 15 * z(t)), + Eq(5 * Derivative(z(t), t), 12 * x(t) - 12 * y(t))), 'func': [x(t), y(t), z(t)], + 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True, + 'func_coeff': -Matrix([ + [0, Rational(-20, 3), Rational(20, 3)], + [Rational(15, 4), 0, Rational(-15, 4)], + [Rational(-12, 5), Rational(12, 5), 0]]), 'type_of_equation': 'type1', 'is_general': True} + assert _classify_linear_system(eq15, [x(t), y(t), z(t)], t) == sol15 + + # Constant coefficient homogeneous ODEs + eq1 = (Eq(diff(x(t), t), x(t) + y(t) + 9), Eq(diff(y(t), t), 2*x(t) + 5*y(t) + 23)) + sol1 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), x(t) + y(t) + 9), + Eq(Derivative(y(t), t), 2*x(t) + 5*y(t) + 23)), 'func': [x(t), y(t)], + 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': False, 'is_general': True, + 'func_coeff': -Matrix([[-1, -1], [-2, -5]]), 'rhs': Matrix([[ 9], [23]]), 'type_of_equation': 'type2'} + assert _classify_linear_system(eq1, funcs, t) == sol1 + + # Non constant coefficient homogeneous ODEs + eq1 = (Eq(diff(x(t), t), 5*t*x(t) + 2*y(t)), Eq(diff(y(t), t), 2*x(t) + 5*t*y(t))) + sol1 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), 5*t*x(t) + 2*y(t)), Eq(Derivative(y(t), t), 5*t*y(t) + 2*x(t))), + 'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': False, + 'is_homogeneous': True, 'func_coeff': -Matrix([ [-5*t, -2], [ -2, -5*t]]), 'commutative_antiderivative': Matrix([ + [5*t**2/2, 2*t], [ 2*t, 5*t**2/2]]), 'type_of_equation': 'type3', 'is_general': True} + assert _classify_linear_system(eq1, funcs, t) == sol1 + + # Non constant coefficient non-homogeneous ODEs + eq1 = [Eq(x1, x(t) + t*y(t) + t), Eq(y1, t*x(t) + y(t))] + sol1 = {'no_of_equation': 2, 'eq': [Eq(Derivative(x(t), t), t*y(t) + t + x(t)), Eq(Derivative(y(t), t), + t*x(t) + y(t))], 'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, + 'is_constant': False, 'is_homogeneous': False, 'is_general': True, 'func_coeff': -Matrix([ [-1, -t], + [-t, -1]]), 'commutative_antiderivative': Matrix([ [ t, t**2/2], [t**2/2, t]]), 'rhs': + Matrix([ [t], [0]]), 'type_of_equation': 'type4'} + assert _classify_linear_system(eq1, funcs, t) == sol1 + + eq2 = [Eq(x1, t*x(t) + t*y(t) + t), Eq(y1, t*x(t) + t*y(t) + cos(t))] + sol2 = {'no_of_equation': 2, 'eq': [Eq(Derivative(x(t), t), t*x(t) + t*y(t) + t), Eq(Derivative(y(t), t), + t*x(t) + t*y(t) + cos(t))], 'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, + 'is_homogeneous': False, 'is_general': True, 'rhs': Matrix([ [ t], [cos(t)]]), 'func_coeff': + Matrix([ [t, t], [t, t]]), 'is_constant': False, 'type_of_equation': 'type4', + 'commutative_antiderivative': Matrix([ [t**2/2, t**2/2], [t**2/2, t**2/2]])} + assert _classify_linear_system(eq2, funcs, t) == sol2 + + eq3 = [Eq(x1, t*(x(t) + y(t) + z(t) + 1)), Eq(y1, t*(x(t) + y(t) + z(t))), Eq(z1, t*(x(t) + y(t) + z(t)))] + sol3 = {'no_of_equation': 3, 'eq': [Eq(Derivative(x(t), t), t*(x(t) + y(t) + z(t) + 1)), + Eq(Derivative(y(t), t), t*(x(t) + y(t) + z(t))), Eq(Derivative(z(t), t), t*(x(t) + y(t) + z(t)))], + 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': + False, 'is_homogeneous': False, 'is_general': True, 'func_coeff': -Matrix([ [-t, -t, -t], [-t, -t, + -t], [-t, -t, -t]]), 'commutative_antiderivative': Matrix([ [t**2/2, t**2/2, t**2/2], [t**2/2, + t**2/2, t**2/2], [t**2/2, t**2/2, t**2/2]]), 'rhs': Matrix([ [t], [0], [0]]), 'type_of_equation': + 'type4'} + assert _classify_linear_system(eq3, funcs_2[:-1], t) == sol3 + + eq4 = [Eq(x1, x(t) + y(t) + t*z(t) + 1), Eq(y1, x(t) + t*y(t) + z(t) + 10), Eq(z1, t*x(t) + y(t) + z(t) + t)] + sol4 = {'no_of_equation': 3, 'eq': [Eq(Derivative(x(t), t), t*z(t) + x(t) + y(t) + 1), Eq(Derivative(y(t), + t), t*y(t) + x(t) + z(t) + 10), Eq(Derivative(z(t), t), t*x(t) + t + y(t) + z(t))], 'func': [x(t), + y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': False, + 'is_homogeneous': False, 'is_general': True, 'func_coeff': -Matrix([ [-1, -1, -t], [-1, -t, -1], [-t, + -1, -1]]), 'commutative_antiderivative': Matrix([ [ t, t, t**2/2], [ t, t**2/2, + t], [t**2/2, t, t]]), 'rhs': Matrix([ [ 1], [10], [ t]]), 'type_of_equation': 'type4'} + assert _classify_linear_system(eq4, funcs_2[:-1], t) == sol4 + + sum_terms = t*(x(t) + y(t) + z(t) + w(t)) + eq5 = [Eq(x1, sum_terms), Eq(y1, sum_terms), Eq(z1, sum_terms + 1), Eq(w1, sum_terms)] + sol5 = {'no_of_equation': 4, 'eq': [Eq(Derivative(x(t), t), t*(w(t) + x(t) + y(t) + z(t))), + Eq(Derivative(y(t), t), t*(w(t) + x(t) + y(t) + z(t))), Eq(Derivative(z(t), t), t*(w(t) + x(t) + + y(t) + z(t)) + 1), Eq(Derivative(w(t), t), t*(w(t) + x(t) + y(t) + z(t)))], 'func': [x(t), y(t), + z(t), w(t)], 'order': {x(t): 1, y(t): 1, z(t): 1, w(t): 1}, 'is_linear': True, 'is_constant': False, + 'is_homogeneous': False, 'is_general': True, 'func_coeff': -Matrix([ [-t, -t, -t, -t], [-t, -t, -t, + -t], [-t, -t, -t, -t], [-t, -t, -t, -t]]), 'commutative_antiderivative': Matrix([ [t**2/2, t**2/2, + t**2/2, t**2/2], [t**2/2, t**2/2, t**2/2, t**2/2], [t**2/2, t**2/2, t**2/2, t**2/2], [t**2/2, + t**2/2, t**2/2, t**2/2]]), 'rhs': Matrix([ [0], [0], [1], [0]]), 'type_of_equation': 'type4'} + assert _classify_linear_system(eq5, funcs_2, t) == sol5 + + # Second Order + t_ = symbols("t_") + + eq1 = (Eq(9*x(t) + 7*y(t) + 4*Derivative(x(t), t) + Derivative(x(t), (t, 2)) + 3*Derivative(y(t), t), 11*exp(I*t)), + Eq(3*x(t) + 12*y(t) + 5*Derivative(x(t), t) + 8*Derivative(y(t), t) + Derivative(y(t), (t, 2)), 2*exp(I*t))) + sol1 = {'no_of_equation': 2, 'eq': (Eq(9*x(t) + 7*y(t) + 4*Derivative(x(t), t) + Derivative(x(t), (t, 2)) + + 3*Derivative(y(t), t), 11*exp(I*t)), Eq(3*x(t) + 12*y(t) + 5*Derivative(x(t), t) + + 8*Derivative(y(t), t) + Derivative(y(t), (t, 2)), 2*exp(I*t))), 'func': [x(t), y(t)], 'order': + {x(t): 2, y(t): 2}, 'is_linear': True, 'is_homogeneous': False, 'is_general': True, 'rhs': Matrix([ + [11*exp(I*t)], [ 2*exp(I*t)]]), 'type_of_equation': 'type0', 'is_second_order': True, + 'is_higher_order': True} + assert _classify_linear_system(eq1, funcs, t) == sol1 + + eq2 = (Eq((4*t**2 + 7*t + 1)**2*Derivative(x(t), (t, 2)), 5*x(t) + 35*y(t)), + Eq((4*t**2 + 7*t + 1)**2*Derivative(y(t), (t, 2)), x(t) + 9*y(t))) + sol2 = {'no_of_equation': 2, 'eq': (Eq((4*t**2 + 7*t + 1)**2*Derivative(x(t), (t, 2)), 5*x(t) + 35*y(t)), + Eq((4*t**2 + 7*t + 1)**2*Derivative(y(t), (t, 2)), x(t) + 9*y(t))), 'func': [x(t), y(t)], 'order': + {x(t): 2, y(t): 2}, 'is_linear': True, 'is_homogeneous': True, 'is_general': True, + 'type_of_equation': 'type2', 'A0': Matrix([ [Rational(53, 4), 35], [ 1, Rational(69, 4)]]), 'g(t)': sqrt(4*t**2 + 7*t + + 1), 'tau': sqrt(33)*log(t - sqrt(33)/8 + Rational(7, 8))/33 - sqrt(33)*log(t + sqrt(33)/8 + Rational(7, 8))/33, + 'is_transformed': True, 't_': t_, 'is_second_order': True, 'is_higher_order': True} + assert _classify_linear_system(eq2, funcs, t) == sol2 + + eq3 = ((t*Derivative(x(t), t) - x(t))*log(t) + (t*Derivative(y(t), t) - y(t))*exp(t) + Derivative(x(t), (t, 2)), + t**2*(t*Derivative(x(t), t) - x(t)) + t*(t*Derivative(y(t), t) - y(t)) + Derivative(y(t), (t, 2))) + sol3 = {'no_of_equation': 2, 'eq': ((t*Derivative(x(t), t) - x(t))*log(t) + (t*Derivative(y(t), t) - + y(t))*exp(t) + Derivative(x(t), (t, 2)), t**2*(t*Derivative(x(t), t) - x(t)) + t*(t*Derivative(y(t), + t) - y(t)) + Derivative(y(t), (t, 2))), 'func': [x(t), y(t)], 'order': {x(t): 2, y(t): 2}, + 'is_linear': True, 'is_homogeneous': True, 'is_general': True, 'type_of_equation': 'type1', 'A1': + Matrix([ [-t*log(t), -t*exp(t)], [ -t**3, -t**2]]), 'is_second_order': True, + 'is_higher_order': True} + assert _classify_linear_system(eq3, funcs, t) == sol3 + + eq4 = (Eq(x2, k*x(t) - l*y1), Eq(y2, l*x1 + k*y(t))) + sol4 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), (t, 2)), k*x(t) - l*Derivative(y(t), t)), + Eq(Derivative(y(t), (t, 2)), k*y(t) + l*Derivative(x(t), t))), 'func': [x(t), y(t)], 'order': {x(t): + 2, y(t): 2}, 'is_linear': True, 'is_homogeneous': True, 'is_general': True, 'type_of_equation': + 'type0', 'is_second_order': True, 'is_higher_order': True} + assert _classify_linear_system(eq4, funcs, t) == sol4 + + + # Multiple matches + + f, g = symbols("f g", cls=Function) + y, t_ = symbols("y t_") + funcs = [f(t), g(t)] + + eq1 = [Eq(Derivative(f(t), t)**2 - 2*Derivative(f(t), t) + 1, 4), + Eq(-y*f(t) + Derivative(g(t), t), 0)] + sol1 = {'is_implicit': True, + 'canon_eqs': [[Eq(Derivative(f(t), t), -1), Eq(Derivative(g(t), t), y*f(t))], + [Eq(Derivative(f(t), t), 3), Eq(Derivative(g(t), t), y*f(t))]]} + assert _classify_linear_system(eq1, funcs, t) == sol1 + + raises(ValueError, lambda: _classify_linear_system(eq1, funcs[:1], t)) + + eq2 = [Eq(Derivative(f(t), t), (2*f(t) + g(t) + 1)/t), Eq(Derivative(g(t), t), (f(t) + 2*g(t))/t)] + sol2 = {'no_of_equation': 2, 'eq': [Eq(Derivative(f(t), t), (2*f(t) + g(t) + 1)/t), Eq(Derivative(g(t), t), + (f(t) + 2*g(t))/t)], 'func': [f(t), g(t)], 'order': {f(t): 1, g(t): 1}, 'is_linear': True, + 'is_homogeneous': False, 'is_general': True, 'rhs': Matrix([ [1], [0]]), 'func_coeff': Matrix([ [2, + 1], [1, 2]]), 'is_constant': False, 'type_of_equation': 'type6', 't_': t_, 'tau': log(t), + 'commutative_antiderivative': Matrix([ [2*log(t), log(t)], [ log(t), 2*log(t)]])} + assert _classify_linear_system(eq2, funcs, t) == sol2 + + eq3 = [Eq(Derivative(f(t), t), (2*f(t) + g(t))/t), Eq(Derivative(g(t), t), (f(t) + 2*g(t))/t)] + sol3 = {'no_of_equation': 2, 'eq': [Eq(Derivative(f(t), t), (2*f(t) + g(t))/t), Eq(Derivative(g(t), t), + (f(t) + 2*g(t))/t)], 'func': [f(t), g(t)], 'order': {f(t): 1, g(t): 1}, 'is_linear': True, + 'is_homogeneous': True, 'is_general': True, 'func_coeff': Matrix([ [2, 1], [1, 2]]), 'is_constant': + False, 'type_of_equation': 'type5', 't_': t_, 'rhs': Matrix([ [0], [0]]), 'tau': log(t), + 'commutative_antiderivative': Matrix([ [2*log(t), log(t)], [ log(t), 2*log(t)]])} + assert _classify_linear_system(eq3, funcs, t) == sol3 + + +def test_matrix_exp(): + from sympy.matrices.dense import Matrix, eye, zeros + from sympy.solvers.ode.systems import matrix_exp + t = Symbol('t') + + for n in range(1, 6+1): + assert matrix_exp(zeros(n), t) == eye(n) + + for n in range(1, 6+1): + A = eye(n) + expAt = exp(t) * eye(n) + assert matrix_exp(A, t) == expAt + + for n in range(1, 6+1): + A = Matrix(n, n, lambda i,j: i+1 if i==j else 0) + expAt = Matrix(n, n, lambda i,j: exp((i+1)*t) if i==j else 0) + assert matrix_exp(A, t) == expAt + + A = Matrix([[0, 1], [-1, 0]]) + expAt = Matrix([[cos(t), sin(t)], [-sin(t), cos(t)]]) + assert matrix_exp(A, t) == expAt + + A = Matrix([[2, -5], [2, -4]]) + expAt = Matrix([ + [3*exp(-t)*sin(t) + exp(-t)*cos(t), -5*exp(-t)*sin(t)], + [2*exp(-t)*sin(t), -3*exp(-t)*sin(t) + exp(-t)*cos(t)] + ]) + assert matrix_exp(A, t) == expAt + + A = Matrix([[21, 17, 6], [-5, -1, -6], [4, 4, 16]]) + # TO update this. + # expAt = Matrix([ + # [(8*t*exp(12*t) + 5*exp(12*t) - 1)*exp(4*t)/4, + # (8*t*exp(12*t) + 5*exp(12*t) - 5)*exp(4*t)/4, + # (exp(12*t) - 1)*exp(4*t)/2], + # [(-8*t*exp(12*t) - exp(12*t) + 1)*exp(4*t)/4, + # (-8*t*exp(12*t) - exp(12*t) + 5)*exp(4*t)/4, + # (-exp(12*t) + 1)*exp(4*t)/2], + # [4*t*exp(16*t), 4*t*exp(16*t), exp(16*t)]]) + expAt = Matrix([ + [2*t*exp(16*t) + 5*exp(16*t)/4 - exp(4*t)/4, 2*t*exp(16*t) + 5*exp(16*t)/4 - 5*exp(4*t)/4, exp(16*t)/2 - exp(4*t)/2], + [ -2*t*exp(16*t) - exp(16*t)/4 + exp(4*t)/4, -2*t*exp(16*t) - exp(16*t)/4 + 5*exp(4*t)/4, -exp(16*t)/2 + exp(4*t)/2], + [ 4*t*exp(16*t), 4*t*exp(16*t), exp(16*t)] + ]) + assert matrix_exp(A, t) == expAt + + A = Matrix([[1, 1, 0, 0], + [0, 1, 1, 0], + [0, 0, 1, -S(1)/8], + [0, 0, S(1)/2, S(1)/2]]) + expAt = Matrix([ + [exp(t), t*exp(t), 4*t*exp(3*t/4) + 8*t*exp(t) + 48*exp(3*t/4) - 48*exp(t), + -2*t*exp(3*t/4) - 2*t*exp(t) - 16*exp(3*t/4) + 16*exp(t)], + [0, exp(t), -t*exp(3*t/4) - 8*exp(3*t/4) + 8*exp(t), t*exp(3*t/4)/2 + 2*exp(3*t/4) - 2*exp(t)], + [0, 0, t*exp(3*t/4)/4 + exp(3*t/4), -t*exp(3*t/4)/8], + [0, 0, t*exp(3*t/4)/2, -t*exp(3*t/4)/4 + exp(3*t/4)] + ]) + assert matrix_exp(A, t) == expAt + + A = Matrix([ + [ 0, 1, 0, 0], + [-1, 0, 0, 0], + [ 0, 0, 0, 1], + [ 0, 0, -1, 0]]) + + expAt = Matrix([ + [ cos(t), sin(t), 0, 0], + [-sin(t), cos(t), 0, 0], + [ 0, 0, cos(t), sin(t)], + [ 0, 0, -sin(t), cos(t)]]) + assert matrix_exp(A, t) == expAt + + A = Matrix([ + [ 0, 1, 1, 0], + [-1, 0, 0, 1], + [ 0, 0, 0, 1], + [ 0, 0, -1, 0]]) + + expAt = Matrix([ + [ cos(t), sin(t), t*cos(t), t*sin(t)], + [-sin(t), cos(t), -t*sin(t), t*cos(t)], + [ 0, 0, cos(t), sin(t)], + [ 0, 0, -sin(t), cos(t)]]) + assert matrix_exp(A, t) == expAt + + # This case is unacceptably slow right now but should be solvable... + #a, b, c, d, e, f = symbols('a b c d e f') + #A = Matrix([ + #[-a, b, c, d], + #[ a, -b, e, 0], + #[ 0, 0, -c - e - f, 0], + #[ 0, 0, f, -d]]) + + A = Matrix([[0, I], [I, 0]]) + expAt = Matrix([ + [exp(I*t)/2 + exp(-I*t)/2, exp(I*t)/2 - exp(-I*t)/2], + [exp(I*t)/2 - exp(-I*t)/2, exp(I*t)/2 + exp(-I*t)/2]]) + assert matrix_exp(A, t) == expAt + + # Testing Errors + M = Matrix([[1, 2, 3], [4, 5, 6], [7, 7, 7]]) + M1 = Matrix([[t, 1], [1, 1]]) + + raises(ValueError, lambda: matrix_exp(M[:, :2], t)) + raises(ValueError, lambda: matrix_exp(M[:2, :], t)) + raises(ValueError, lambda: matrix_exp(M1, t)) + raises(ValueError, lambda: matrix_exp(M1[:1, :1], t)) + + +def test_canonical_odes(): + f, g, h = symbols('f g h', cls=Function) + x = symbols('x') + funcs = [f(x), g(x), h(x)] + + eqs1 = [Eq(f(x).diff(x, x), f(x) + 2*g(x)), Eq(g(x) + 1, g(x).diff(x) + f(x))] + sol1 = [[Eq(Derivative(f(x), (x, 2)), f(x) + 2*g(x)), Eq(Derivative(g(x), x), -f(x) + g(x) + 1)]] + assert canonical_odes(eqs1, funcs[:2], x) == sol1 + + eqs2 = [Eq(f(x).diff(x), h(x).diff(x) + f(x)), Eq(g(x).diff(x)**2, f(x) + h(x)), Eq(h(x).diff(x), f(x))] + sol2 = [[Eq(Derivative(f(x), x), 2*f(x)), Eq(Derivative(g(x), x), -sqrt(f(x) + h(x))), Eq(Derivative(h(x), x), f(x))], + [Eq(Derivative(f(x), x), 2*f(x)), Eq(Derivative(g(x), x), sqrt(f(x) + h(x))), Eq(Derivative(h(x), x), f(x))]] + assert canonical_odes(eqs2, funcs, x) == sol2 + + +def test_sysode_linear_neq_order1_type1(): + + f, g, x, y, h = symbols('f g x y h', cls=Function) + a, b, c, t = symbols('a b c t') + + eqs1 = [Eq(Derivative(x(t), t), x(t)), + Eq(Derivative(y(t), t), y(t))] + sol1 = [Eq(x(t), C1*exp(t)), + Eq(y(t), C2*exp(t))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + eqs2 = [Eq(Derivative(x(t), t), 2*x(t)), + Eq(Derivative(y(t), t), 3*y(t))] + sol2 = [Eq(x(t), C1*exp(2*t)), + Eq(y(t), C2*exp(3*t))] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = [Eq(Derivative(x(t), t), a*x(t)), + Eq(Derivative(y(t), t), a*y(t))] + sol3 = [Eq(x(t), C1*exp(a*t)), + Eq(y(t), C2*exp(a*t))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0]) + + # Regression test case for issue #15474 + # https://github.com/sympy/sympy/issues/15474 + eqs4 = [Eq(Derivative(x(t), t), a*x(t)), + Eq(Derivative(y(t), t), b*y(t))] + sol4 = [Eq(x(t), C1*exp(a*t)), + Eq(y(t), C2*exp(b*t))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0]) + + eqs5 = [Eq(Derivative(x(t), t), -y(t)), + Eq(Derivative(y(t), t), x(t))] + sol5 = [Eq(x(t), -C1*sin(t) - C2*cos(t)), + Eq(y(t), C1*cos(t) - C2*sin(t))] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0]) + + eqs6 = [Eq(Derivative(x(t), t), -2*y(t)), + Eq(Derivative(y(t), t), 2*x(t))] + sol6 = [Eq(x(t), -C1*sin(2*t) - C2*cos(2*t)), + Eq(y(t), C1*cos(2*t) - C2*sin(2*t))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0]) + + eqs7 = [Eq(Derivative(x(t), t), I*y(t)), + Eq(Derivative(y(t), t), I*x(t))] + sol7 = [Eq(x(t), -C1*exp(-I*t) + C2*exp(I*t)), + Eq(y(t), C1*exp(-I*t) + C2*exp(I*t))] + assert dsolve(eqs7) == sol7 + assert checksysodesol(eqs7, sol7) == (True, [0, 0]) + + eqs8 = [Eq(Derivative(x(t), t), -a*y(t)), + Eq(Derivative(y(t), t), a*x(t))] + sol8 = [Eq(x(t), -I*C1*exp(-I*a*t) + I*C2*exp(I*a*t)), + Eq(y(t), C1*exp(-I*a*t) + C2*exp(I*a*t))] + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0]) + + eqs9 = [Eq(Derivative(x(t), t), x(t) + y(t)), + Eq(Derivative(y(t), t), x(t) - y(t))] + sol9 = [Eq(x(t), C1*(1 - sqrt(2))*exp(-sqrt(2)*t) + C2*(1 + sqrt(2))*exp(sqrt(2)*t)), + Eq(y(t), C1*exp(-sqrt(2)*t) + C2*exp(sqrt(2)*t))] + assert dsolve(eqs9) == sol9 + assert checksysodesol(eqs9, sol9) == (True, [0, 0]) + + eqs10 = [Eq(Derivative(x(t), t), x(t) + y(t)), + Eq(Derivative(y(t), t), x(t) + y(t))] + sol10 = [Eq(x(t), -C1 + C2*exp(2*t)), + Eq(y(t), C1 + C2*exp(2*t))] + assert dsolve(eqs10) == sol10 + assert checksysodesol(eqs10, sol10) == (True, [0, 0]) + + eqs11 = [Eq(Derivative(x(t), t), 2*x(t) + y(t)), + Eq(Derivative(y(t), t), -x(t) + 2*y(t))] + sol11 = [Eq(x(t), C1*exp(2*t)*sin(t) + C2*exp(2*t)*cos(t)), + Eq(y(t), C1*exp(2*t)*cos(t) - C2*exp(2*t)*sin(t))] + assert dsolve(eqs11) == sol11 + assert checksysodesol(eqs11, sol11) == (True, [0, 0]) + + eqs12 = [Eq(Derivative(x(t), t), x(t) + 2*y(t)), + Eq(Derivative(y(t), t), 2*x(t) + y(t))] + sol12 = [Eq(x(t), -C1*exp(-t) + C2*exp(3*t)), + Eq(y(t), C1*exp(-t) + C2*exp(3*t))] + assert dsolve(eqs12) == sol12 + assert checksysodesol(eqs12, sol12) == (True, [0, 0]) + + eqs13 = [Eq(Derivative(x(t), t), 4*x(t) + y(t)), + Eq(Derivative(y(t), t), -x(t) + 2*y(t))] + sol13 = [Eq(x(t), C2*t*exp(3*t) + (C1 + C2)*exp(3*t)), + Eq(y(t), -C1*exp(3*t) - C2*t*exp(3*t))] + assert dsolve(eqs13) == sol13 + assert checksysodesol(eqs13, sol13) == (True, [0, 0]) + + eqs14 = [Eq(Derivative(x(t), t), a*y(t)), + Eq(Derivative(y(t), t), a*x(t))] + sol14 = [Eq(x(t), -C1*exp(-a*t) + C2*exp(a*t)), + Eq(y(t), C1*exp(-a*t) + C2*exp(a*t))] + assert dsolve(eqs14) == sol14 + assert checksysodesol(eqs14, sol14) == (True, [0, 0]) + + eqs15 = [Eq(Derivative(x(t), t), a*y(t)), + Eq(Derivative(y(t), t), b*x(t))] + sol15 = [Eq(x(t), -C1*a*exp(-t*sqrt(a*b))/sqrt(a*b) + C2*a*exp(t*sqrt(a*b))/sqrt(a*b)), + Eq(y(t), C1*exp(-t*sqrt(a*b)) + C2*exp(t*sqrt(a*b)))] + assert dsolve(eqs15) == sol15 + assert checksysodesol(eqs15, sol15) == (True, [0, 0]) + + eqs16 = [Eq(Derivative(x(t), t), a*x(t) + b*y(t)), + Eq(Derivative(y(t), t), c*x(t))] + sol16 = [Eq(x(t), -2*C1*b*exp(t*(a + sqrt(a**2 + 4*b*c))/2)/(a - sqrt(a**2 + 4*b*c)) - 2*C2*b*exp(t*(a - + sqrt(a**2 + 4*b*c))/2)/(a + sqrt(a**2 + 4*b*c))), + Eq(y(t), C1*exp(t*(a + sqrt(a**2 + 4*b*c))/2) + C2*exp(t*(a - sqrt(a**2 + 4*b*c))/2))] + assert dsolve(eqs16) == sol16 + assert checksysodesol(eqs16, sol16) == (True, [0, 0]) + + # Regression test case for issue #18562 + # https://github.com/sympy/sympy/issues/18562 + eqs17 = [Eq(Derivative(x(t), t), a*y(t) + x(t)), + Eq(Derivative(y(t), t), a*x(t) - y(t))] + sol17 = [Eq(x(t), C1*a*exp(t*sqrt(a**2 + 1))/(sqrt(a**2 + 1) - 1) - C2*a*exp(-t*sqrt(a**2 + 1))/(sqrt(a**2 + + 1) + 1)), + Eq(y(t), C1*exp(t*sqrt(a**2 + 1)) + C2*exp(-t*sqrt(a**2 + 1)))] + assert dsolve(eqs17) == sol17 + assert checksysodesol(eqs17, sol17) == (True, [0, 0]) + + eqs18 = [Eq(Derivative(x(t), t), 0), + Eq(Derivative(y(t), t), 0)] + sol18 = [Eq(x(t), C1), + Eq(y(t), C2)] + assert dsolve(eqs18) == sol18 + assert checksysodesol(eqs18, sol18) == (True, [0, 0]) + + eqs19 = [Eq(Derivative(x(t), t), 2*x(t) - y(t)), + Eq(Derivative(y(t), t), x(t))] + sol19 = [Eq(x(t), C2*t*exp(t) + (C1 + C2)*exp(t)), + Eq(y(t), C1*exp(t) + C2*t*exp(t))] + assert dsolve(eqs19) == sol19 + assert checksysodesol(eqs19, sol19) == (True, [0, 0]) + + eqs20 = [Eq(Derivative(x(t), t), x(t)), + Eq(Derivative(y(t), t), x(t) + y(t))] + sol20 = [Eq(x(t), C1*exp(t)), + Eq(y(t), C1*t*exp(t) + C2*exp(t))] + assert dsolve(eqs20) == sol20 + assert checksysodesol(eqs20, sol20) == (True, [0, 0]) + + eqs21 = [Eq(Derivative(x(t), t), 3*x(t)), + Eq(Derivative(y(t), t), x(t) + y(t))] + sol21 = [Eq(x(t), 2*C1*exp(3*t)), + Eq(y(t), C1*exp(3*t) + C2*exp(t))] + assert dsolve(eqs21) == sol21 + assert checksysodesol(eqs21, sol21) == (True, [0, 0]) + + eqs22 = [Eq(Derivative(x(t), t), 3*x(t)), + Eq(Derivative(y(t), t), y(t))] + sol22 = [Eq(x(t), C1*exp(3*t)), + Eq(y(t), C2*exp(t))] + assert dsolve(eqs22) == sol22 + assert checksysodesol(eqs22, sol22) == (True, [0, 0]) + + +@slow +def test_sysode_linear_neq_order1_type1_slow(): + + t = Symbol('t') + Z0 = Function('Z0') + Z1 = Function('Z1') + Z2 = Function('Z2') + Z3 = Function('Z3') + + k01, k10, k20, k21, k23, k30 = symbols('k01 k10 k20 k21 k23 k30') + + eqs1 = [Eq(Derivative(Z0(t), t), -k01*Z0(t) + k10*Z1(t) + k20*Z2(t) + k30*Z3(t)), + Eq(Derivative(Z1(t), t), k01*Z0(t) - k10*Z1(t) + k21*Z2(t)), + Eq(Derivative(Z2(t), t), (-k20 - k21 - k23)*Z2(t)), + Eq(Derivative(Z3(t), t), k23*Z2(t) - k30*Z3(t))] + sol1 = [Eq(Z0(t), C1*k10/k01 - C2*(k10 - k30)*exp(-k30*t)/(k01 + k10 - k30) - C3*(k10*(k20 + k21 - k30) - + k20**2 - k20*(k21 + k23 - k30) + k23*k30)*exp(-t*(k20 + k21 + k23))/(k23*(-k01 - k10 + k20 + k21 + + k23)) - C4*exp(-t*(k01 + k10))), + Eq(Z1(t), C1 - C2*k01*exp(-k30*t)/(k01 + k10 - k30) + C3*(-k01*(k20 + k21 - k30) + k20*k21 + k21**2 + + k21*(k23 - k30))*exp(-t*(k20 + k21 + k23))/(k23*(-k01 - k10 + k20 + k21 + k23)) + C4*exp(-t*(k01 + + k10))), + Eq(Z2(t), -C3*(k20 + k21 + k23 - k30)*exp(-t*(k20 + k21 + k23))/k23), + Eq(Z3(t), C2*exp(-k30*t) + C3*exp(-t*(k20 + k21 + k23)))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0, 0, 0]) + + x, y, z, u, v, w = symbols('x y z u v w', cls=Function) + k2, k3 = symbols('k2 k3') + a_b, a_c = symbols('a_b a_c', real=True) + + eqs2 = [Eq(Derivative(z(t), t), k2*y(t)), + Eq(Derivative(x(t), t), k3*y(t)), + Eq(Derivative(y(t), t), (-k2 - k3)*y(t))] + sol2 = [Eq(z(t), C1 - C2*k2*exp(-t*(k2 + k3))/(k2 + k3)), + Eq(x(t), -C2*k3*exp(-t*(k2 + k3))/(k2 + k3) + C3), + Eq(y(t), C2*exp(-t*(k2 + k3)))] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0, 0]) + + eqs3 = [4*u(t) - v(t) - 2*w(t) + Derivative(u(t), t), + 2*u(t) + v(t) - 2*w(t) + Derivative(v(t), t), + 5*u(t) + v(t) - 3*w(t) + Derivative(w(t), t)] + sol3 = [Eq(u(t), C3*exp(-2*t) + (C1/2 + sqrt(3)*C2/6)*cos(sqrt(3)*t) + sin(sqrt(3)*t)*(sqrt(3)*C1/6 + + C2*Rational(-1, 2))), + Eq(v(t), (C1/2 + sqrt(3)*C2/6)*cos(sqrt(3)*t) + sin(sqrt(3)*t)*(sqrt(3)*C1/6 + C2*Rational(-1, 2))), + Eq(w(t), C1*cos(sqrt(3)*t) - C2*sin(sqrt(3)*t) + C3*exp(-2*t))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0, 0]) + + eqs4 = [Eq(Derivative(x(t), t), w(t)*Rational(-2, 9) + 2*x(t) + y(t) + z(t)*Rational(-8, 9)), + Eq(Derivative(y(t), t), w(t)*Rational(4, 9) + 2*y(t) + z(t)*Rational(16, 9)), + Eq(Derivative(z(t), t), w(t)*Rational(-2, 9) + z(t)*Rational(37, 9)), + Eq(Derivative(w(t), t), w(t)*Rational(44, 9) + z(t)*Rational(-4, 9))] + sol4 = [Eq(x(t), C1*exp(2*t) + C2*t*exp(2*t)), + Eq(y(t), C2*exp(2*t) + 2*C3*exp(4*t)), + Eq(z(t), 2*C3*exp(4*t) + C4*exp(5*t)*Rational(-1, 4)), + Eq(w(t), C3*exp(4*t) + C4*exp(5*t))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0, 0, 0]) + + # Regression test case for issue #15574 + # https://github.com/sympy/sympy/issues/15574 + eq5 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), y(t)), Eq(z(t).diff(t), z(t)), Eq(w(t).diff(t), w(t))] + sol5 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t)), Eq(w(t), C4*exp(t))] + assert dsolve(eq5) == sol5 + assert checksysodesol(eq5, sol5) == (True, [0, 0, 0, 0]) + + eqs6 = [Eq(Derivative(x(t), t), x(t) + y(t)), + Eq(Derivative(y(t), t), y(t) + z(t)), + Eq(Derivative(z(t), t), w(t)*Rational(-1, 8) + z(t)), + Eq(Derivative(w(t), t), w(t)/2 + z(t)/2)] + sol6 = [Eq(x(t), C1*exp(t) + C2*t*exp(t) + 4*C4*t*exp(t*Rational(3, 4)) + (4*C3 + 48*C4)*exp(t*Rational(3, + 4))), + Eq(y(t), C2*exp(t) - C4*t*exp(t*Rational(3, 4)) - (C3 + 8*C4)*exp(t*Rational(3, 4))), + Eq(z(t), C4*t*exp(t*Rational(3, 4))/4 + (C3/4 + C4)*exp(t*Rational(3, 4))), + Eq(w(t), C3*exp(t*Rational(3, 4))/2 + C4*t*exp(t*Rational(3, 4))/2)] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0, 0, 0]) + + # Regression test case for issue #15574 + # https://github.com/sympy/sympy/issues/15574 + eq7 = [Eq(Derivative(x(t), t), x(t)), Eq(Derivative(y(t), t), y(t)), Eq(Derivative(z(t), t), z(t)), + Eq(Derivative(w(t), t), w(t)), Eq(Derivative(u(t), t), u(t))] + sol7 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t)), Eq(w(t), C4*exp(t)), + Eq(u(t), C5*exp(t))] + assert dsolve(eq7) == sol7 + assert checksysodesol(eq7, sol7) == (True, [0, 0, 0, 0, 0]) + + eqs8 = [Eq(Derivative(x(t), t), 2*x(t) + y(t)), + Eq(Derivative(y(t), t), 2*y(t)), + Eq(Derivative(z(t), t), 4*z(t)), + Eq(Derivative(w(t), t), u(t) + 5*w(t)), + Eq(Derivative(u(t), t), 5*u(t))] + sol8 = [Eq(x(t), C1*exp(2*t) + C2*t*exp(2*t)), + Eq(y(t), C2*exp(2*t)), + Eq(z(t), C3*exp(4*t)), + Eq(w(t), C4*exp(5*t) + C5*t*exp(5*t)), + Eq(u(t), C5*exp(5*t))] + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0, 0, 0, 0]) + + # Regression test case for issue #15574 + # https://github.com/sympy/sympy/issues/15574 + eq9 = [Eq(Derivative(x(t), t), x(t)), Eq(Derivative(y(t), t), y(t)), Eq(Derivative(z(t), t), z(t))] + sol9 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t))] + assert dsolve(eq9) == sol9 + assert checksysodesol(eq9, sol9) == (True, [0, 0, 0]) + + # Regression test case for issue #15407 + # https://github.com/sympy/sympy/issues/15407 + eqs10 = [Eq(Derivative(x(t), t), (-a_b - a_c)*x(t)), + Eq(Derivative(y(t), t), a_b*y(t)), + Eq(Derivative(z(t), t), a_c*x(t))] + sol10 = [Eq(x(t), -C1*(a_b + a_c)*exp(-t*(a_b + a_c))/a_c), + Eq(y(t), C2*exp(a_b*t)), + Eq(z(t), C1*exp(-t*(a_b + a_c)) + C3)] + assert dsolve(eqs10) == sol10 + assert checksysodesol(eqs10, sol10) == (True, [0, 0, 0]) + + # Regression test case for issue #14312 + # https://github.com/sympy/sympy/issues/14312 + eqs11 = [Eq(Derivative(x(t), t), k3*y(t)), + Eq(Derivative(y(t), t), (-k2 - k3)*y(t)), + Eq(Derivative(z(t), t), k2*y(t))] + sol11 = [Eq(x(t), C1 + C2*k3*exp(-t*(k2 + k3))/k2), + Eq(y(t), -C2*(k2 + k3)*exp(-t*(k2 + k3))/k2), + Eq(z(t), C2*exp(-t*(k2 + k3)) + C3)] + assert dsolve(eqs11) == sol11 + assert checksysodesol(eqs11, sol11) == (True, [0, 0, 0]) + + # Regression test case for issue #14312 + # https://github.com/sympy/sympy/issues/14312 + eqs12 = [Eq(Derivative(z(t), t), k2*y(t)), + Eq(Derivative(x(t), t), k3*y(t)), + Eq(Derivative(y(t), t), (-k2 - k3)*y(t))] + sol12 = [Eq(z(t), C1 - C2*k2*exp(-t*(k2 + k3))/(k2 + k3)), + Eq(x(t), -C2*k3*exp(-t*(k2 + k3))/(k2 + k3) + C3), + Eq(y(t), C2*exp(-t*(k2 + k3)))] + assert dsolve(eqs12) == sol12 + assert checksysodesol(eqs12, sol12) == (True, [0, 0, 0]) + + f, g, h = symbols('f, g, h', cls=Function) + a, b, c = symbols('a, b, c') + + # Regression test case for issue #15474 + # https://github.com/sympy/sympy/issues/15474 + eqs13 = [Eq(Derivative(f(t), t), 2*f(t) + g(t)), + Eq(Derivative(g(t), t), a*f(t))] + sol13 = [Eq(f(t), C1*exp(t*(sqrt(a + 1) + 1))/(sqrt(a + 1) - 1) - C2*exp(-t*(sqrt(a + 1) - 1))/(sqrt(a + 1) + + 1)), + Eq(g(t), C1*exp(t*(sqrt(a + 1) + 1)) + C2*exp(-t*(sqrt(a + 1) - 1)))] + assert dsolve(eqs13) == sol13 + assert checksysodesol(eqs13, sol13) == (True, [0, 0]) + + eqs14 = [Eq(Derivative(f(t), t), 2*g(t) - 3*h(t)), + Eq(Derivative(g(t), t), -2*f(t) + 4*h(t)), + Eq(Derivative(h(t), t), 3*f(t) - 4*g(t))] + sol14 = [Eq(f(t), 2*C1 - sin(sqrt(29)*t)*(sqrt(29)*C2*Rational(3, 25) + C3*Rational(-8, 25)) - + cos(sqrt(29)*t)*(C2*Rational(8, 25) + sqrt(29)*C3*Rational(3, 25))), + Eq(g(t), C1*Rational(3, 2) + sin(sqrt(29)*t)*(sqrt(29)*C2*Rational(4, 25) + C3*Rational(6, 25)) - + cos(sqrt(29)*t)*(C2*Rational(6, 25) + sqrt(29)*C3*Rational(-4, 25))), + Eq(h(t), C1 + C2*cos(sqrt(29)*t) - C3*sin(sqrt(29)*t))] + assert dsolve(eqs14) == sol14 + assert checksysodesol(eqs14, sol14) == (True, [0, 0, 0]) + + eqs15 = [Eq(2*Derivative(f(t), t), 12*g(t) - 12*h(t)), + Eq(3*Derivative(g(t), t), -8*f(t) + 8*h(t)), + Eq(4*Derivative(h(t), t), 6*f(t) - 6*g(t))] + sol15 = [Eq(f(t), C1 - sin(sqrt(29)*t)*(sqrt(29)*C2*Rational(6, 13) + C3*Rational(-16, 13)) - + cos(sqrt(29)*t)*(C2*Rational(16, 13) + sqrt(29)*C3*Rational(6, 13))), + Eq(g(t), C1 + sin(sqrt(29)*t)*(sqrt(29)*C2*Rational(8, 39) + C3*Rational(16, 13)) - + cos(sqrt(29)*t)*(C2*Rational(16, 13) + sqrt(29)*C3*Rational(-8, 39))), + Eq(h(t), C1 + C2*cos(sqrt(29)*t) - C3*sin(sqrt(29)*t))] + assert dsolve(eqs15) == sol15 + assert checksysodesol(eqs15, sol15) == (True, [0, 0, 0]) + + eq16 = (Eq(diff(x(t), t), 21*x(t)), Eq(diff(y(t), t), 17*x(t) + 3*y(t)), + Eq(diff(z(t), t), 5*x(t) + 7*y(t) + 9*z(t))) + sol16 = [Eq(x(t), 216*C1*exp(21*t)/209), + Eq(y(t), 204*C1*exp(21*t)/209 - 6*C2*exp(3*t)/7), + Eq(z(t), C1*exp(21*t) + C2*exp(3*t) + C3*exp(9*t))] + assert dsolve(eq16) == sol16 + assert checksysodesol(eq16, sol16) == (True, [0, 0, 0]) + + eqs17 = [Eq(Derivative(x(t), t), 3*y(t) - 11*z(t)), + Eq(Derivative(y(t), t), -3*x(t) + 7*z(t)), + Eq(Derivative(z(t), t), 11*x(t) - 7*y(t))] + sol17 = [Eq(x(t), C1*Rational(7, 3) - sin(sqrt(179)*t)*(sqrt(179)*C2*Rational(11, 170) + C3*Rational(-21, + 170)) - cos(sqrt(179)*t)*(C2*Rational(21, 170) + sqrt(179)*C3*Rational(11, 170))), + Eq(y(t), C1*Rational(11, 3) + sin(sqrt(179)*t)*(sqrt(179)*C2*Rational(7, 170) + C3*Rational(33, + 170)) - cos(sqrt(179)*t)*(C2*Rational(33, 170) + sqrt(179)*C3*Rational(-7, 170))), + Eq(z(t), C1 + C2*cos(sqrt(179)*t) - C3*sin(sqrt(179)*t))] + assert dsolve(eqs17) == sol17 + assert checksysodesol(eqs17, sol17) == (True, [0, 0, 0]) + + eqs18 = [Eq(3*Derivative(x(t), t), 20*y(t) - 20*z(t)), + Eq(4*Derivative(y(t), t), -15*x(t) + 15*z(t)), + Eq(5*Derivative(z(t), t), 12*x(t) - 12*y(t))] + sol18 = [Eq(x(t), C1 - sin(5*sqrt(2)*t)*(sqrt(2)*C2*Rational(4, 3) - C3) - cos(5*sqrt(2)*t)*(C2 + + sqrt(2)*C3*Rational(4, 3))), + Eq(y(t), C1 + sin(5*sqrt(2)*t)*(sqrt(2)*C2*Rational(3, 4) + C3) - cos(5*sqrt(2)*t)*(C2 + + sqrt(2)*C3*Rational(-3, 4))), + Eq(z(t), C1 + C2*cos(5*sqrt(2)*t) - C3*sin(5*sqrt(2)*t))] + assert dsolve(eqs18) == sol18 + assert checksysodesol(eqs18, sol18) == (True, [0, 0, 0]) + + eqs19 = [Eq(Derivative(x(t), t), 4*x(t) - z(t)), + Eq(Derivative(y(t), t), 2*x(t) + 2*y(t) - z(t)), + Eq(Derivative(z(t), t), 3*x(t) + y(t))] + sol19 = [Eq(x(t), C2*t**2*exp(2*t)/2 + t*(2*C2 + C3)*exp(2*t) + (C1 + C2 + 2*C3)*exp(2*t)), + Eq(y(t), C2*t**2*exp(2*t)/2 + t*(2*C2 + C3)*exp(2*t) + (C1 + 2*C3)*exp(2*t)), + Eq(z(t), C2*t**2*exp(2*t) + t*(3*C2 + 2*C3)*exp(2*t) + (2*C1 + 3*C3)*exp(2*t))] + assert dsolve(eqs19) == sol19 + assert checksysodesol(eqs19, sol19) == (True, [0, 0, 0]) + + eqs20 = [Eq(Derivative(x(t), t), 4*x(t) - y(t) - 2*z(t)), + Eq(Derivative(y(t), t), 2*x(t) + y(t) - 2*z(t)), + Eq(Derivative(z(t), t), 5*x(t) - 3*z(t))] + sol20 = [Eq(x(t), C1*exp(2*t) - sin(t)*(C2*Rational(3, 5) + C3/5) - cos(t)*(C2/5 + C3*Rational(-3, 5))), + Eq(y(t), -sin(t)*(C2*Rational(3, 5) + C3/5) - cos(t)*(C2/5 + C3*Rational(-3, 5))), + Eq(z(t), C1*exp(2*t) - C2*sin(t) + C3*cos(t))] + assert dsolve(eqs20) == sol20 + assert checksysodesol(eqs20, sol20) == (True, [0, 0, 0]) + + eq21 = (Eq(diff(x(t), t), 9*y(t)), Eq(diff(y(t), t), 12*x(t))) + sol21 = [Eq(x(t), -sqrt(3)*C1*exp(-6*sqrt(3)*t)/2 + sqrt(3)*C2*exp(6*sqrt(3)*t)/2), + Eq(y(t), C1*exp(-6*sqrt(3)*t) + C2*exp(6*sqrt(3)*t))] + + assert dsolve(eq21) == sol21 + assert checksysodesol(eq21, sol21) == (True, [0, 0]) + + eqs22 = [Eq(Derivative(x(t), t), 2*x(t) + 4*y(t)), + Eq(Derivative(y(t), t), 12*x(t) + 41*y(t))] + sol22 = [Eq(x(t), C1*(39 - sqrt(1713))*exp(t*(sqrt(1713) + 43)/2)*Rational(-1, 24) + C2*(39 + + sqrt(1713))*exp(t*(43 - sqrt(1713))/2)*Rational(-1, 24)), + Eq(y(t), C1*exp(t*(sqrt(1713) + 43)/2) + C2*exp(t*(43 - sqrt(1713))/2))] + assert dsolve(eqs22) == sol22 + assert checksysodesol(eqs22, sol22) == (True, [0, 0]) + + eqs23 = [Eq(Derivative(x(t), t), x(t) + y(t)), + Eq(Derivative(y(t), t), -2*x(t) + 2*y(t))] + sol23 = [Eq(x(t), (C1/4 + sqrt(7)*C2/4)*cos(sqrt(7)*t/2)*exp(t*Rational(3, 2)) + + sin(sqrt(7)*t/2)*(sqrt(7)*C1/4 + C2*Rational(-1, 4))*exp(t*Rational(3, 2))), + Eq(y(t), C1*cos(sqrt(7)*t/2)*exp(t*Rational(3, 2)) - C2*sin(sqrt(7)*t/2)*exp(t*Rational(3, 2)))] + assert dsolve(eqs23) == sol23 + assert checksysodesol(eqs23, sol23) == (True, [0, 0]) + + # Regression test case for issue #15474 + # https://github.com/sympy/sympy/issues/15474 + a = Symbol("a", real=True) + eq24 = [x(t).diff(t) - a*y(t), y(t).diff(t) + a*x(t)] + sol24 = [Eq(x(t), C1*sin(a*t) + C2*cos(a*t)), Eq(y(t), C1*cos(a*t) - C2*sin(a*t))] + assert dsolve(eq24) == sol24 + assert checksysodesol(eq24, sol24) == (True, [0, 0]) + + # Regression test case for issue #19150 + # https://github.com/sympy/sympy/issues/19150 + eqs25 = [Eq(Derivative(f(t), t), 0), + Eq(Derivative(g(t), t), (f(t) - 2*g(t) + x(t))/(b*c)), + Eq(Derivative(x(t), t), (g(t) - 2*x(t) + y(t))/(b*c)), + Eq(Derivative(y(t), t), (h(t) + x(t) - 2*y(t))/(b*c)), + Eq(Derivative(h(t), t), 0)] + sol25 = [Eq(f(t), -3*C1 + 4*C2), + Eq(g(t), -2*C1 + 3*C2 - C3*exp(-2*t/(b*c)) + C4*exp(-t*(sqrt(2) + 2)/(b*c)) + C5*exp(-t*(2 - + sqrt(2))/(b*c))), + Eq(x(t), -C1 + 2*C2 - sqrt(2)*C4*exp(-t*(sqrt(2) + 2)/(b*c)) + sqrt(2)*C5*exp(-t*(2 - + sqrt(2))/(b*c))), + Eq(y(t), C2 + C3*exp(-2*t/(b*c)) + C4*exp(-t*(sqrt(2) + 2)/(b*c)) + C5*exp(-t*(2 - sqrt(2))/(b*c))), + Eq(h(t), C1)] + assert dsolve(eqs25) == sol25 + assert checksysodesol(eqs25, sol25) == (True, [0, 0, 0, 0, 0]) + + eq26 = [Eq(Derivative(f(t), t), 2*f(t)), Eq(Derivative(g(t), t), 3*f(t) + 7*g(t))] + sol26 = [Eq(f(t), -5*C1*exp(2*t)/3), Eq(g(t), C1*exp(2*t) + C2*exp(7*t))] + assert dsolve(eq26) == sol26 + assert checksysodesol(eq26, sol26) == (True, [0, 0]) + + eq27 = [Eq(Derivative(f(t), t), -9*I*f(t) - 4*g(t)), Eq(Derivative(g(t), t), -4*I*g(t))] + sol27 = [Eq(f(t), 4*I*C1*exp(-4*I*t)/5 + C2*exp(-9*I*t)), Eq(g(t), C1*exp(-4*I*t))] + assert dsolve(eq27) == sol27 + assert checksysodesol(eq27, sol27) == (True, [0, 0]) + + eq28 = [Eq(Derivative(f(t), t), -9*I*f(t)), Eq(Derivative(g(t), t), -4*I*g(t))] + sol28 = [Eq(f(t), C1*exp(-9*I*t)), Eq(g(t), C2*exp(-4*I*t))] + assert dsolve(eq28) == sol28 + assert checksysodesol(eq28, sol28) == (True, [0, 0]) + + eq29 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), 0)] + sol29 = [Eq(f(t), C1), Eq(g(t), C2)] + assert dsolve(eq29) == sol29 + assert checksysodesol(eq29, sol29) == (True, [0, 0]) + + eq30 = [Eq(Derivative(f(t), t), f(t)), Eq(Derivative(g(t), t), 0)] + sol30 = [Eq(f(t), C1*exp(t)), Eq(g(t), C2)] + assert dsolve(eq30) == sol30 + assert checksysodesol(eq30, sol30) == (True, [0, 0]) + + eq31 = [Eq(Derivative(f(t), t), g(t)), Eq(Derivative(g(t), t), 0)] + sol31 = [Eq(f(t), C1 + C2*t), Eq(g(t), C2)] + assert dsolve(eq31) == sol31 + assert checksysodesol(eq31, sol31) == (True, [0, 0]) + + eq32 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), f(t))] + sol32 = [Eq(f(t), C1), Eq(g(t), C1*t + C2)] + assert dsolve(eq32) == sol32 + assert checksysodesol(eq32, sol32) == (True, [0, 0]) + + eq33 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), g(t))] + sol33 = [Eq(f(t), C1), Eq(g(t), C2*exp(t))] + assert dsolve(eq33) == sol33 + assert checksysodesol(eq33, sol33) == (True, [0, 0]) + + eq34 = [Eq(Derivative(f(t), t), f(t)), Eq(Derivative(g(t), t), I*g(t))] + sol34 = [Eq(f(t), C1*exp(t)), Eq(g(t), C2*exp(I*t))] + assert dsolve(eq34) == sol34 + assert checksysodesol(eq34, sol34) == (True, [0, 0]) + + eq35 = [Eq(Derivative(f(t), t), I*f(t)), Eq(Derivative(g(t), t), -I*g(t))] + sol35 = [Eq(f(t), C1*exp(I*t)), Eq(g(t), C2*exp(-I*t))] + assert dsolve(eq35) == sol35 + assert checksysodesol(eq35, sol35) == (True, [0, 0]) + + eq36 = [Eq(Derivative(f(t), t), I*g(t)), Eq(Derivative(g(t), t), 0)] + sol36 = [Eq(f(t), I*C1 + I*C2*t), Eq(g(t), C2)] + assert dsolve(eq36) == sol36 + assert checksysodesol(eq36, sol36) == (True, [0, 0]) + + eq37 = [Eq(Derivative(f(t), t), I*g(t)), Eq(Derivative(g(t), t), I*f(t))] + sol37 = [Eq(f(t), -C1*exp(-I*t) + C2*exp(I*t)), Eq(g(t), C1*exp(-I*t) + C2*exp(I*t))] + assert dsolve(eq37) == sol37 + assert checksysodesol(eq37, sol37) == (True, [0, 0]) + + # Multiple systems + eq1 = [Eq(Derivative(f(t), t)**2, g(t)**2), Eq(-f(t) + Derivative(g(t), t), 0)] + sol1 = [[Eq(f(t), -C1*sin(t) - C2*cos(t)), + Eq(g(t), C1*cos(t) - C2*sin(t))], + [Eq(f(t), -C1*exp(-t) + C2*exp(t)), + Eq(g(t), C1*exp(-t) + C2*exp(t))]] + assert dsolve(eq1) == sol1 + for sol in sol1: + assert checksysodesol(eq1, sol) == (True, [0, 0]) + + +def test_sysode_linear_neq_order1_type2(): + + f, g, h, k = symbols('f g h k', cls=Function) + x, t, a, b, c, d, y = symbols('x t a b c d y') + k1, k2 = symbols('k1 k2') + + + eqs1 = [Eq(Derivative(f(x), x), f(x) + g(x) + 5), + Eq(Derivative(g(x), x), -f(x) - g(x) + 7)] + sol1 = [Eq(f(x), C1 + C2 + 6*x**2 + x*(C2 + 5)), + Eq(g(x), -C1 - 6*x**2 - x*(C2 - 7))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + eqs2 = [Eq(Derivative(f(x), x), f(x) + g(x) + 5), + Eq(Derivative(g(x), x), f(x) + g(x) + 7)] + sol2 = [Eq(f(x), -C1 + C2*exp(2*x) - x - 3), + Eq(g(x), C1 + C2*exp(2*x) + x - 3)] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = [Eq(Derivative(f(x), x), f(x) + 5), + Eq(Derivative(g(x), x), f(x) + 7)] + sol3 = [Eq(f(x), C1*exp(x) - 5), + Eq(g(x), C1*exp(x) + C2 + 2*x - 5)] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0]) + + eqs4 = [Eq(Derivative(f(x), x), f(x) + exp(x)), + Eq(Derivative(g(x), x), x*exp(x) + f(x) + g(x))] + sol4 = [Eq(f(x), C1*exp(x) + x*exp(x)), + Eq(g(x), C1*x*exp(x) + C2*exp(x) + x**2*exp(x))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0]) + + eqs5 = [Eq(Derivative(f(x), x), 5*x + f(x) + g(x)), + Eq(Derivative(g(x), x), f(x) - g(x))] + sol5 = [Eq(f(x), C1*(1 + sqrt(2))*exp(sqrt(2)*x) + C2*(1 - sqrt(2))*exp(-sqrt(2)*x) + x*Rational(-5, 2) + + Rational(-5, 2)), + Eq(g(x), C1*exp(sqrt(2)*x) + C2*exp(-sqrt(2)*x) + x*Rational(-5, 2))] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0]) + + eqs6 = [Eq(Derivative(f(x), x), -9*f(x) - 4*g(x)), + Eq(Derivative(g(x), x), -4*g(x)), + Eq(Derivative(h(x), x), h(x) + exp(x))] + sol6 = [Eq(f(x), C2*exp(-4*x)*Rational(-4, 5) + C1*exp(-9*x)), + Eq(g(x), C2*exp(-4*x)), + Eq(h(x), C3*exp(x) + x*exp(x))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0, 0]) + + # Regression test case for issue #8859 + # https://github.com/sympy/sympy/issues/8859 + eqs7 = [Eq(Derivative(f(t), t), 3*t + f(t)), + Eq(Derivative(g(t), t), g(t))] + sol7 = [Eq(f(t), C1*exp(t) - 3*t - 3), + Eq(g(t), C2*exp(t))] + assert dsolve(eqs7) == sol7 + assert checksysodesol(eqs7, sol7) == (True, [0, 0]) + + # Regression test case for issue #8567 + # https://github.com/sympy/sympy/issues/8567 + eqs8 = [Eq(Derivative(f(t), t), f(t) + 2*g(t)), + Eq(Derivative(g(t), t), -2*f(t) + g(t) + 2*exp(t))] + sol8 = [Eq(f(t), C1*exp(t)*sin(2*t) + C2*exp(t)*cos(2*t) + + exp(t)*sin(2*t)**2 + exp(t)*cos(2*t)**2), + Eq(g(t), C1*exp(t)*cos(2*t) - C2*exp(t)*sin(2*t))] + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0]) + + # Regression test case for issue #19150 + # https://github.com/sympy/sympy/issues/19150 + eqs9 = [Eq(Derivative(f(t), t), (c - 2*f(t) + g(t))/(a*b)), + Eq(Derivative(g(t), t), (f(t) - 2*g(t) + h(t))/(a*b)), + Eq(Derivative(h(t), t), (d + g(t) - 2*h(t))/(a*b))] + sol9 = [Eq(f(t), -C1*exp(-2*t/(a*b)) + C2*exp(-t*(sqrt(2) + 2)/(a*b)) + C3*exp(-t*(2 - sqrt(2))/(a*b)) + + Mul(Rational(1, 4), 3*c + d, evaluate=False)), + Eq(g(t), -sqrt(2)*C2*exp(-t*(sqrt(2) + 2)/(a*b)) + sqrt(2)*C3*exp(-t*(2 - sqrt(2))/(a*b)) + + Mul(Rational(1, 2), c + d, evaluate=False)), + Eq(h(t), C1*exp(-2*t/(a*b)) + C2*exp(-t*(sqrt(2) + 2)/(a*b)) + C3*exp(-t*(2 - sqrt(2))/(a*b)) + + Mul(Rational(1, 4), c + 3*d, evaluate=False))] + assert dsolve(eqs9) == sol9 + assert checksysodesol(eqs9, sol9) == (True, [0, 0, 0]) + + # Regression test case for issue #16635 + # https://github.com/sympy/sympy/issues/16635 + eqs10 = [Eq(Derivative(f(t), t), 15*t + f(t) - g(t) - 10), + Eq(Derivative(g(t), t), -15*t + f(t) - g(t) - 5)] + sol10 = [Eq(f(t), C1 + C2 + 5*t**3 + 5*t**2 + t*(C2 - 10)), + Eq(g(t), C1 + 5*t**3 - 10*t**2 + t*(C2 - 5))] + assert dsolve(eqs10) == sol10 + assert checksysodesol(eqs10, sol10) == (True, [0, 0]) + + # Multiple solutions + eqs11 = [Eq(Derivative(f(t), t)**2 - 2*Derivative(f(t), t) + 1, 4), + Eq(-y*f(t) + Derivative(g(t), t), 0)] + sol11 = [[Eq(f(t), C1 - t), Eq(g(t), C1*t*y + C2*y + t**2*y*Rational(-1, 2))], + [Eq(f(t), C1 + 3*t), Eq(g(t), C1*t*y + C2*y + t**2*y*Rational(3, 2))]] + assert dsolve(eqs11) == sol11 + for s11 in sol11: + assert checksysodesol(eqs11, s11) == (True, [0, 0]) + + # test case for issue #19831 + # https://github.com/sympy/sympy/issues/19831 + n = symbols('n', positive=True) + x0 = symbols('x_0') + t0 = symbols('t_0') + x_0 = symbols('x_0') + t_0 = symbols('t_0') + t = symbols('t') + x = Function('x') + y = Function('y') + T = symbols('T') + + eqs12 = [Eq(Derivative(y(t), t), x(t)), + Eq(Derivative(x(t), t), n*(y(t) + 1))] + sol12 = [Eq(y(t), C1*exp(sqrt(n)*t)*n**Rational(-1, 2) - C2*exp(-sqrt(n)*t)*n**Rational(-1, 2) - 1), + Eq(x(t), C1*exp(sqrt(n)*t) + C2*exp(-sqrt(n)*t))] + assert dsolve(eqs12) == sol12 + assert checksysodesol(eqs12, sol12) == (True, [0, 0]) + + sol12b = [ + Eq(y(t), (T*exp(-sqrt(n)*t_0)/2 + exp(-sqrt(n)*t_0)/2 + + x_0*exp(-sqrt(n)*t_0)/(2*sqrt(n)))*exp(sqrt(n)*t) + + (T*exp(sqrt(n)*t_0)/2 + exp(sqrt(n)*t_0)/2 - + x_0*exp(sqrt(n)*t_0)/(2*sqrt(n)))*exp(-sqrt(n)*t) - 1), + Eq(x(t), (T*sqrt(n)*exp(-sqrt(n)*t_0)/2 + sqrt(n)*exp(-sqrt(n)*t_0)/2 + + x_0*exp(-sqrt(n)*t_0)/2)*exp(sqrt(n)*t) + - (T*sqrt(n)*exp(sqrt(n)*t_0)/2 + sqrt(n)*exp(sqrt(n)*t_0)/2 - + x_0*exp(sqrt(n)*t_0)/2)*exp(-sqrt(n)*t)) + ] + assert dsolve(eqs12, ics={y(t0): T, x(t0): x0}) == sol12b + assert checksysodesol(eqs12, sol12b) == (True, [0, 0]) + + #Test cases added for the issue 19763 + #https://github.com/sympy/sympy/issues/19763 + + eq13 = [Eq(Derivative(f(t), t), f(t) + g(t) + 9), + Eq(Derivative(g(t), t), 2*f(t) + 5*g(t) + 23)] + sol13 = [Eq(f(t), -C1*(2 + sqrt(6))*exp(t*(3 - sqrt(6)))/2 - C2*(2 - sqrt(6))*exp(t*(sqrt(6) + 3))/2 - + Rational(22,3)), + Eq(g(t), C1*exp(t*(3 - sqrt(6))) + C2*exp(t*(sqrt(6) + 3)) - Rational(5,3))] + assert dsolve(eq13) == sol13 + assert checksysodesol(eq13, sol13) == (True, [0, 0]) + + eq14 = [Eq(Derivative(f(t), t), f(t) + g(t) + 81), + Eq(Derivative(g(t), t), -2*f(t) + g(t) + 23)] + sol14 = [Eq(f(t), sqrt(2)*C1*exp(t)*sin(sqrt(2)*t)/2 + + sqrt(2)*C2*exp(t)*cos(sqrt(2)*t)/2 + - 58*sin(sqrt(2)*t)**2/3 - 58*cos(sqrt(2)*t)**2/3), + Eq(g(t), C1*exp(t)*cos(sqrt(2)*t) - C2*exp(t)*sin(sqrt(2)*t) + - 185*sin(sqrt(2)*t)**2/3 - 185*cos(sqrt(2)*t)**2/3)] + assert dsolve(eq14) == sol14 + assert checksysodesol(eq14, sol14) == (True, [0,0]) + + eq15 = [Eq(Derivative(f(t), t), f(t) + 2*g(t) + k1), + Eq(Derivative(g(t), t), 3*f(t) + 4*g(t) + k2)] + sol15 = [Eq(f(t), -C1*(3 - sqrt(33))*exp(t*(5 + sqrt(33))/2)/6 - + C2*(3 + sqrt(33))*exp(t*(5 - sqrt(33))/2)/6 + 2*k1 - k2), + Eq(g(t), C1*exp(t*(5 + sqrt(33))/2) + C2*exp(t*(5 - sqrt(33))/2) - + Mul(Rational(1,2), 3*k1 - k2, evaluate = False))] + assert dsolve(eq15) == sol15 + assert checksysodesol(eq15, sol15) == (True, [0,0]) + + eq16 = [Eq(Derivative(f(t), t), k1), + Eq(Derivative(g(t), t), k2)] + sol16 = [Eq(f(t), C1 + k1*t), + Eq(g(t), C2 + k2*t)] + assert dsolve(eq16) == sol16 + assert checksysodesol(eq16, sol16) == (True, [0,0]) + + eq17 = [Eq(Derivative(f(t), t), 0), + Eq(Derivative(g(t), t), c*f(t) + k2)] + sol17 = [Eq(f(t), C1), + Eq(g(t), C2*c + t*(C1*c + k2))] + assert dsolve(eq17) == sol17 + assert checksysodesol(eq17 , sol17) == (True , [0,0]) + + eq18 = [Eq(Derivative(f(t), t), k1), + Eq(Derivative(g(t), t), f(t) + k2)] + sol18 = [Eq(f(t), C1 + k1*t), + Eq(g(t), C2 + k1*t**2/2 + t*(C1 + k2))] + assert dsolve(eq18) == sol18 + assert checksysodesol(eq18 , sol18) == (True , [0,0]) + + eq19 = [Eq(Derivative(f(t), t), k1), + Eq(Derivative(g(t), t), f(t) + 2*g(t) + k2)] + sol19 = [Eq(f(t), -2*C1 + k1*t), + Eq(g(t), C1 + C2*exp(2*t) - k1*t/2 - Mul(Rational(1,4), k1 + 2*k2 , evaluate = False))] + assert dsolve(eq19) == sol19 + assert checksysodesol(eq19 , sol19) == (True , [0,0]) + + eq20 = [Eq(diff(f(t), t), f(t) + k1), + Eq(diff(g(t), t), k2)] + sol20 = [Eq(f(t), C1*exp(t) - k1), + Eq(g(t), C2 + k2*t)] + assert dsolve(eq20) == sol20 + assert checksysodesol(eq20 , sol20) == (True , [0,0]) + + eq21 = [Eq(diff(f(t), t), g(t) + k1), + Eq(diff(g(t), t), 0)] + sol21 = [Eq(f(t), C1 + t*(C2 + k1)), + Eq(g(t), C2)] + assert dsolve(eq21) == sol21 + assert checksysodesol(eq21 , sol21) == (True , [0,0]) + + eq22 = [Eq(Derivative(f(t), t), f(t) + 2*g(t) + k1), + Eq(Derivative(g(t), t), k2)] + sol22 = [Eq(f(t), -2*C1 + C2*exp(t) - k1 - 2*k2*t - 2*k2), + Eq(g(t), C1 + k2*t)] + assert dsolve(eq22) == sol22 + assert checksysodesol(eq22 , sol22) == (True , [0,0]) + + eq23 = [Eq(Derivative(f(t), t), g(t) + k1), + Eq(Derivative(g(t), t), 2*g(t) + k2)] + sol23 = [Eq(f(t), C1 + C2*exp(2*t)/2 - k2/4 + t*(2*k1 - k2)/2), + Eq(g(t), C2*exp(2*t) - k2/2)] + assert dsolve(eq23) == sol23 + assert checksysodesol(eq23 , sol23) == (True , [0,0]) + + eq24 = [Eq(Derivative(f(t), t), f(t) + k1), + Eq(Derivative(g(t), t), 2*f(t) + k2)] + sol24 = [Eq(f(t), C1*exp(t)/2 - k1), + Eq(g(t), C1*exp(t) + C2 - 2*k1 - t*(2*k1 - k2))] + assert dsolve(eq24) == sol24 + assert checksysodesol(eq24 , sol24) == (True , [0,0]) + + eq25 = [Eq(Derivative(f(t), t), f(t) + 2*g(t) + k1), + Eq(Derivative(g(t), t), 3*f(t) + 6*g(t) + k2)] + sol25 = [Eq(f(t), -2*C1 + C2*exp(7*t)/3 + 2*t*(3*k1 - k2)/7 - + Mul(Rational(1,49), k1 + 2*k2 , evaluate = False)), + Eq(g(t), C1 + C2*exp(7*t) - t*(3*k1 - k2)/7 - + Mul(Rational(3,49), k1 + 2*k2 , evaluate = False))] + assert dsolve(eq25) == sol25 + assert checksysodesol(eq25 , sol25) == (True , [0,0]) + + eq26 = [Eq(Derivative(f(t), t), 2*f(t) - g(t) + k1), + Eq(Derivative(g(t), t), 4*f(t) - 2*g(t) + 2*k1)] + sol26 = [Eq(f(t), C1 + 2*C2 + t*(2*C1 + k1)), + Eq(g(t), 4*C2 + t*(4*C1 + 2*k1))] + assert dsolve(eq26) == sol26 + assert checksysodesol(eq26 , sol26) == (True , [0,0]) + + # Test Case added for issue #22715 + # https://github.com/sympy/sympy/issues/22715 + + eq27 = [Eq(diff(x(t),t),-1*y(t)+10), Eq(diff(y(t),t),5*x(t)-2*y(t)+3)] + sol27 = [Eq(x(t), (C1/5 - 2*C2/5)*exp(-t)*cos(2*t) + - (2*C1/5 + C2/5)*exp(-t)*sin(2*t) + + 17*sin(2*t)**2/5 + 17*cos(2*t)**2/5), + Eq(y(t), C1*exp(-t)*cos(2*t) - C2*exp(-t)*sin(2*t) + + 10*sin(2*t)**2 + 10*cos(2*t)**2)] + assert dsolve(eq27) == sol27 + assert checksysodesol(eq27 , sol27) == (True , [0,0]) + + +def test_sysode_linear_neq_order1_type3(): + + f, g, h, k, x0 , y0 = symbols('f g h k x0 y0', cls=Function) + x, t, a = symbols('x t a') + r = symbols('r', real=True) + + eqs1 = [Eq(Derivative(f(r), r), r*g(r) + f(r)), + Eq(Derivative(g(r), r), -r*f(r) + g(r))] + sol1 = [Eq(f(r), C1*exp(r)*sin(r**2/2) + C2*exp(r)*cos(r**2/2)), + Eq(g(r), C1*exp(r)*cos(r**2/2) - C2*exp(r)*sin(r**2/2))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + eqs2 = [Eq(Derivative(f(x), x), x**2*g(x) + x*f(x)), + Eq(Derivative(g(x), x), 2*x**2*f(x) + (3*x**2 + x)*g(x))] + sol2 = [Eq(f(x), (sqrt(17)*C1/17 + C2*(17 - 3*sqrt(17))/34)*exp(x**3*(3 + sqrt(17))/6 + x**2/2) - + exp(x**3*(3 - sqrt(17))/6 + x**2/2)*(sqrt(17)*C1/17 + C2*(3*sqrt(17) + 17)*Rational(-1, 34))), + Eq(g(x), exp(x**3*(3 - sqrt(17))/6 + x**2/2)*(C1*(17 - 3*sqrt(17))/34 + sqrt(17)*C2*Rational(-2, + 17)) + exp(x**3*(3 + sqrt(17))/6 + x**2/2)*(C1*(3*sqrt(17) + 17)/34 + sqrt(17)*C2*Rational(2, 17)))] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = [Eq(f(x).diff(x), x*f(x) + g(x)), + Eq(g(x).diff(x), -f(x) + x*g(x))] + sol3 = [Eq(f(x), (C1/2 + I*C2/2)*exp(x**2/2 - I*x) + exp(x**2/2 + I*x)*(C1/2 + I*C2*Rational(-1, 2))), + Eq(g(x), (I*C1/2 + C2/2)*exp(x**2/2 + I*x) - exp(x**2/2 - I*x)*(I*C1/2 + C2*Rational(-1, 2)))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0]) + + eqs4 = [Eq(f(x).diff(x), x*(f(x) + g(x) + h(x))), Eq(g(x).diff(x), x*(f(x) + g(x) + h(x))), + Eq(h(x).diff(x), x*(f(x) + g(x) + h(x)))] + sol4 = [Eq(f(x), -C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2)), + Eq(g(x), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2)), + Eq(h(x), -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0, 0]) + + eqs5 = [Eq(f(x).diff(x), x**2*(f(x) + g(x) + h(x))), Eq(g(x).diff(x), x**2*(f(x) + g(x) + h(x))), + Eq(h(x).diff(x), x**2*(f(x) + g(x) + h(x)))] + sol5 = [Eq(f(x), -C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3)), + Eq(g(x), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3)), + Eq(h(x), -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3))] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0, 0]) + + eqs6 = [Eq(Derivative(f(x), x), x*(f(x) + g(x) + h(x) + k(x))), + Eq(Derivative(g(x), x), x*(f(x) + g(x) + h(x) + k(x))), + Eq(Derivative(h(x), x), x*(f(x) + g(x) + h(x) + k(x))), + Eq(Derivative(k(x), x), x*(f(x) + g(x) + h(x) + k(x)))] + sol6 = [Eq(f(x), -C1/4 - C2/4 - C3/4 + 3*C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)), + Eq(g(x), 3*C1/4 - C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)), + Eq(h(x), -C1/4 + 3*C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)), + Eq(k(x), -C1/4 - C2/4 + 3*C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0, 0, 0]) + + y = symbols("y", real=True) + + eqs7 = [Eq(Derivative(f(y), y), y*f(y) + g(y)), + Eq(Derivative(g(y), y), y*g(y) - f(y))] + sol7 = [Eq(f(y), C1*exp(y**2/2)*sin(y) + C2*exp(y**2/2)*cos(y)), + Eq(g(y), C1*exp(y**2/2)*cos(y) - C2*exp(y**2/2)*sin(y))] + assert dsolve(eqs7) == sol7 + assert checksysodesol(eqs7, sol7) == (True, [0, 0]) + + #Test cases added for the issue 19763 + #https://github.com/sympy/sympy/issues/19763 + + eqs8 = [Eq(Derivative(f(t), t), 5*t*f(t) + 2*h(t)), + Eq(Derivative(h(t), t), 2*f(t) + 5*t*h(t))] + sol8 = [Eq(f(t), Mul(-1, (C1/2 - C2/2), evaluate = False)*exp(5*t**2/2 - 2*t) + (C1/2 + C2/2)*exp(5*t**2/2 + 2*t)), + Eq(h(t), (C1/2 - C2/2)*exp(5*t**2/2 - 2*t) + (C1/2 + C2/2)*exp(5*t**2/2 + 2*t))] + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0]) + + eqs9 = [Eq(diff(f(t), t), 5*t*f(t) + t**2*g(t)), + Eq(diff(g(t), t), -t**2*f(t) + 5*t*g(t))] + sol9 = [Eq(f(t), (C1/2 - I*C2/2)*exp(I*t**3/3 + 5*t**2/2) + (C1/2 + I*C2/2)*exp(-I*t**3/3 + 5*t**2/2)), + Eq(g(t), Mul(-1, (I*C1/2 - C2/2) , evaluate = False)*exp(-I*t**3/3 + 5*t**2/2) + (I*C1/2 + C2/2)*exp(I*t**3/3 + 5*t**2/2))] + assert dsolve(eqs9) == sol9 + assert checksysodesol(eqs9 , sol9) == (True , [0,0]) + + eqs10 = [Eq(diff(f(t), t), t**2*g(t) + 5*t*f(t)), + Eq(diff(g(t), t), -t**2*f(t) + (9*t**2 + 5*t)*g(t))] + sol10 = [Eq(f(t), (C1*(77 - 9*sqrt(77))/154 + sqrt(77)*C2/77)*exp(t**3*(sqrt(77) + 9)/6 + 5*t**2/2) + (C1*(77 + 9*sqrt(77))/154 - sqrt(77)*C2/77)*exp(t**3*(9 - sqrt(77))/6 + 5*t**2/2)), + Eq(g(t), (sqrt(77)*C1/77 + C2*(77 - 9*sqrt(77))/154)*exp(t**3*(9 - sqrt(77))/6 + 5*t**2/2) - (sqrt(77)*C1/77 - C2*(77 + 9*sqrt(77))/154)*exp(t**3*(sqrt(77) + 9)/6 + 5*t**2/2))] + assert dsolve(eqs10) == sol10 + assert checksysodesol(eqs10 , sol10) == (True , [0,0]) + + eqs11 = [Eq(diff(f(t), t), 5*t*f(t) + t**2*g(t)), + Eq(diff(g(t), t), (1-t**2)*f(t) + (5*t + 9*t**2)*g(t))] + sol11 = [Eq(f(t), C1*x0(t) + C2*x0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t)), + Eq(g(t), C1*y0(t) + C2*(y0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t) + exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)))] + assert dsolve(eqs11) == sol11 + +@slow +def test_sysode_linear_neq_order1_type4(): + + f, g, h, k = symbols('f g h k', cls=Function) + x, t, a = symbols('x t a') + r = symbols('r', real=True) + + eqs1 = [Eq(diff(f(r), r), f(r) + r*g(r) + r**2), Eq(diff(g(r), r), -r*f(r) + g(r) + r)] + sol1 = [Eq(f(r), C1*exp(r)*sin(r**2/2) + C2*exp(r)*cos(r**2/2) + exp(r)*sin(r**2/2)*Integral(r**2*exp(-r)*sin(r**2/2) + + r*exp(-r)*cos(r**2/2), r) + exp(r)*cos(r**2/2)*Integral(r**2*exp(-r)*cos(r**2/2) - r*exp(-r)*sin(r**2/2), r)), + Eq(g(r), C1*exp(r)*cos(r**2/2) - C2*exp(r)*sin(r**2/2) - exp(r)*sin(r**2/2)*Integral(r**2*exp(-r)*cos(r**2/2) - + r*exp(-r)*sin(r**2/2), r) + exp(r)*cos(r**2/2)*Integral(r**2*exp(-r)*sin(r**2/2) + r*exp(-r)*cos(r**2/2), r))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + eqs2 = [Eq(diff(f(r), r), f(r) + r*g(r) + r), Eq(diff(g(r), r), -r*f(r) + g(r) + log(r))] + sol2 = [Eq(f(r), C1*exp(r)*sin(r**2/2) + C2*exp(r)*cos(r**2/2) + exp(r)*sin(r**2/2)*Integral(r*exp(-r)*sin(r**2/2) + + exp(-r)*log(r)*cos(r**2/2), r) + exp(r)*cos(r**2/2)*Integral(r*exp(-r)*cos(r**2/2) - exp(-r)*log(r)*sin( + r**2/2), r)), + Eq(g(r), C1*exp(r)*cos(r**2/2) - C2*exp(r)*sin(r**2/2) - exp(r)*sin(r**2/2)*Integral(r*exp(-r)*cos(r**2/2) - + exp(-r)*log(r)*sin(r**2/2), r) + exp(r)*cos(r**2/2)*Integral(r*exp(-r)*sin(r**2/2) + exp(-r)*log(r)*cos( + r**2/2), r))] + # XXX: dsolve hangs for this in integration + assert dsolve_system(eqs2, simplify=False, doit=False) == [sol2] + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = [Eq(Derivative(f(x), x), x*(f(x) + g(x) + h(x)) + x), + Eq(Derivative(g(x), x), x*(f(x) + g(x) + h(x)) + x), + Eq(Derivative(h(x), x), x*(f(x) + g(x) + h(x)) + 1)] + sol3 = [Eq(f(x), C1*Rational(-1, 3) + C2*Rational(-1, 3) + C3*Rational(2, 3) + x**2/6 + x*Rational(-1, 3) + + (C1/3 + C2/3 + C3/3)*exp(x**2*Rational(3, 2)) + + sqrt(6)*sqrt(pi)*erf(sqrt(6)*x/2)*exp(x**2*Rational(3, 2))/18 + Rational(-2, 9)), + Eq(g(x), C1*Rational(2, 3) + C2*Rational(-1, 3) + C3*Rational(-1, 3) + x**2/6 + x*Rational(-1, 3) + + (C1/3 + C2/3 + C3/3)*exp(x**2*Rational(3, 2)) + + sqrt(6)*sqrt(pi)*erf(sqrt(6)*x/2)*exp(x**2*Rational(3, 2))/18 + Rational(-2, 9)), + Eq(h(x), C1*Rational(-1, 3) + C2*Rational(2, 3) + C3*Rational(-1, 3) + x**2*Rational(-1, 3) + + x*Rational(2, 3) + (C1/3 + C2/3 + C3/3)*exp(x**2*Rational(3, 2)) + + sqrt(6)*sqrt(pi)*erf(sqrt(6)*x/2)*exp(x**2*Rational(3, 2))/18 + Rational(-2, 9))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0, 0]) + + eqs4 = [Eq(Derivative(f(x), x), x*(f(x) + g(x) + h(x)) + sin(x)), + Eq(Derivative(g(x), x), x*(f(x) + g(x) + h(x)) + sin(x)), + Eq(Derivative(h(x), x), x*(f(x) + g(x) + h(x)) + sin(x))] + sol4 = [Eq(f(x), C1*Rational(-1, 3) + C2*Rational(-1, 3) + C3*Rational(2, 3) + (C1/3 + C2/3 + + C3/3)*exp(x**2*Rational(3, 2)) + Integral(sin(x)*exp(x**2*Rational(-3, 2)), x)*exp(x**2*Rational(3, + 2))), + Eq(g(x), C1*Rational(2, 3) + C2*Rational(-1, 3) + C3*Rational(-1, 3) + (C1/3 + C2/3 + + C3/3)*exp(x**2*Rational(3, 2)) + Integral(sin(x)*exp(x**2*Rational(-3, 2)), x)*exp(x**2*Rational(3, + 2))), + Eq(h(x), C1*Rational(-1, 3) + C2*Rational(2, 3) + C3*Rational(-1, 3) + (C1/3 + C2/3 + + C3/3)*exp(x**2*Rational(3, 2)) + Integral(sin(x)*exp(x**2*Rational(-3, 2)), x)*exp(x**2*Rational(3, + 2)))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0, 0]) + + eqs5 = [Eq(Derivative(f(x), x), x*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(g(x), x), x*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(h(x), x), x*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(k(x), x), x*(f(x) + g(x) + h(x) + k(x) + 1))] + sol5 = [Eq(f(x), C1*Rational(-1, 4) + C2*Rational(-1, 4) + C3*Rational(-1, 4) + C4*Rational(3, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(2*x**2) + Rational(-1, 4)), + Eq(g(x), C1*Rational(3, 4) + C2*Rational(-1, 4) + C3*Rational(-1, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(2*x**2) + Rational(-1, 4)), + Eq(h(x), C1*Rational(-1, 4) + C2*Rational(3, 4) + C3*Rational(-1, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(2*x**2) + Rational(-1, 4)), + Eq(k(x), C1*Rational(-1, 4) + C2*Rational(-1, 4) + C3*Rational(3, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(2*x**2) + Rational(-1, 4))] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0, 0, 0]) + + eqs6 = [Eq(Derivative(f(x), x), x**2*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(g(x), x), x**2*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(h(x), x), x**2*(f(x) + g(x) + h(x) + k(x) + 1)), + Eq(Derivative(k(x), x), x**2*(f(x) + g(x) + h(x) + k(x) + 1))] + sol6 = [Eq(f(x), C1*Rational(-1, 4) + C2*Rational(-1, 4) + C3*Rational(-1, 4) + C4*Rational(3, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(x**3*Rational(4, 3)) + Rational(-1, 4)), + Eq(g(x), C1*Rational(3, 4) + C2*Rational(-1, 4) + C3*Rational(-1, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(x**3*Rational(4, 3)) + Rational(-1, 4)), + Eq(h(x), C1*Rational(-1, 4) + C2*Rational(3, 4) + C3*Rational(-1, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(x**3*Rational(4, 3)) + Rational(-1, 4)), + Eq(k(x), C1*Rational(-1, 4) + C2*Rational(-1, 4) + C3*Rational(3, 4) + C4*Rational(-1, 4) + (C1/4 + + C2/4 + C3/4 + C4/4)*exp(x**3*Rational(4, 3)) + Rational(-1, 4))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0, 0, 0]) + + eqs7 = [Eq(Derivative(f(x), x), (f(x) + g(x) + h(x))*log(x) + sin(x)), Eq(Derivative(g(x), x), (f(x) + g(x) + + h(x))*log(x) + sin(x)), Eq(Derivative(h(x), x), (f(x) + g(x) + h(x))*log(x) + sin(x))] + sol7 = [Eq(f(x), -C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + + C3/3)*exp(x*(3*log(x) - 3)) + exp(x*(3*log(x) - + 3))*Integral(exp(3*x)*exp(-3*x*log(x))*sin(x), x)), + Eq(g(x), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + + C3/3)*exp(x*(3*log(x) - 3)) + exp(x*(3*log(x) - + 3))*Integral(exp(3*x)*exp(-3*x*log(x))*sin(x), x)), + Eq(h(x), -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + + C3/3)*exp(x*(3*log(x) - 3)) + exp(x*(3*log(x) - + 3))*Integral(exp(3*x)*exp(-3*x*log(x))*sin(x), x))] + with dotprodsimp(True): + assert dsolve(eqs7, simplify=False, doit=False) == sol7 + assert checksysodesol(eqs7, sol7) == (True, [0, 0, 0]) + + eqs8 = [Eq(Derivative(f(x), x), (f(x) + g(x) + h(x) + k(x))*log(x) + sin(x)), Eq(Derivative(g(x), x), (f(x) + + g(x) + h(x) + k(x))*log(x) + sin(x)), Eq(Derivative(h(x), x), (f(x) + g(x) + h(x) + k(x))*log(x) + + sin(x)), Eq(Derivative(k(x), x), (f(x) + g(x) + h(x) + k(x))*log(x) + sin(x))] + sol8 = [Eq(f(x), -C1/4 - C2/4 - C3/4 + 3*C4/4 + (C1/4 + C2/4 + C3/4 + + C4/4)*exp(x*(4*log(x) - 4)) + exp(x*(4*log(x) - + 4))*Integral(exp(4*x)*exp(-4*x*log(x))*sin(x), x)), + Eq(g(x), 3*C1/4 - C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + + C4/4)*exp(x*(4*log(x) - 4)) + exp(x*(4*log(x) - + 4))*Integral(exp(4*x)*exp(-4*x*log(x))*sin(x), x)), + Eq(h(x), -C1/4 + 3*C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + + C4/4)*exp(x*(4*log(x) - 4)) + exp(x*(4*log(x) - + 4))*Integral(exp(4*x)*exp(-4*x*log(x))*sin(x), x)), + Eq(k(x), -C1/4 - C2/4 + 3*C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + + C4/4)*exp(x*(4*log(x) - 4)) + exp(x*(4*log(x) - + 4))*Integral(exp(4*x)*exp(-4*x*log(x))*sin(x), x))] + with dotprodsimp(True): + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0, 0, 0]) + + +def test_sysode_linear_neq_order1_type5_type6(): + f, g = symbols("f g", cls=Function) + x, x_ = symbols("x x_") + + # Type 5 + eqs1 = [Eq(Derivative(f(x), x), (2*f(x) + g(x))/x), Eq(Derivative(g(x), x), (f(x) + 2*g(x))/x)] + sol1 = [Eq(f(x), -C1*x + C2*x**3), Eq(g(x), C1*x + C2*x**3)] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + # Type 6 + eqs2 = [Eq(Derivative(f(x), x), (2*f(x) + g(x) + 1)/x), + Eq(Derivative(g(x), x), (x + f(x) + 2*g(x))/x)] + sol2 = [Eq(f(x), C2*x**3 - x*(C1 + Rational(1, 4)) + x*log(x)*Rational(-1, 2) + Rational(-2, 3)), + Eq(g(x), C2*x**3 + x*log(x)/2 + x*(C1 + Rational(-1, 4)) + Rational(1, 3))] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + +def test_higher_order_to_first_order(): + f, g = symbols('f g', cls=Function) + x = symbols('x') + + eqs1 = [Eq(Derivative(f(x), (x, 2)), 2*f(x) + g(x)), + Eq(Derivative(g(x), (x, 2)), -f(x))] + sol1 = [Eq(f(x), -C2*x*exp(-x) + C3*x*exp(x) - (C1 - C2)*exp(-x) + (C3 + C4)*exp(x)), + Eq(g(x), C2*x*exp(-x) - C3*x*exp(x) + (C1 + C2)*exp(-x) + (C3 - C4)*exp(x))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + eqs2 = [Eq(f(x).diff(x, 2), 0), Eq(g(x).diff(x, 2), f(x))] + sol2 = [Eq(f(x), C1 + C2*x), Eq(g(x), C1*x**2/2 + C2*x**3/6 + C3 + C4*x)] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = [Eq(Derivative(f(x), (x, 2)), 2*f(x)), + Eq(Derivative(g(x), (x, 2)), -f(x) + 2*g(x))] + sol3 = [Eq(f(x), 4*C1*exp(-sqrt(2)*x) + 4*C2*exp(sqrt(2)*x)), + Eq(g(x), sqrt(2)*C1*x*exp(-sqrt(2)*x) - sqrt(2)*C2*x*exp(sqrt(2)*x) + (C1 + + sqrt(2)*C4)*exp(-sqrt(2)*x) + (C2 - sqrt(2)*C3)*exp(sqrt(2)*x))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0]) + + eqs4 = [Eq(Derivative(f(x), (x, 2)), 2*f(x) + g(x)), + Eq(Derivative(g(x), (x, 2)), 2*g(x))] + sol4 = [Eq(f(x), C1*x*exp(sqrt(2)*x)/4 + C3*x*exp(-sqrt(2)*x)/4 + (C2/4 + sqrt(2)*C3/8)*exp(-sqrt(2)*x) - + exp(sqrt(2)*x)*(sqrt(2)*C1/8 + C4*Rational(-1, 4))), + Eq(g(x), sqrt(2)*C1*exp(sqrt(2)*x)/2 + sqrt(2)*C3*exp(-sqrt(2)*x)*Rational(-1, 2))] + assert dsolve(eqs4) == sol4 + assert checksysodesol(eqs4, sol4) == (True, [0, 0]) + + eqs5 = [Eq(f(x).diff(x, 2), f(x)), Eq(g(x).diff(x, 2), f(x))] + sol5 = [Eq(f(x), -C1*exp(-x) + C2*exp(x)), Eq(g(x), -C1*exp(-x) + C2*exp(x) + C3 + C4*x)] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0]) + + eqs6 = [Eq(Derivative(f(x), (x, 2)), f(x) + g(x)), + Eq(Derivative(g(x), (x, 2)), -f(x) - g(x))] + sol6 = [Eq(f(x), C1 + C2*x**2/2 + C2 + C4*x**3/6 + x*(C3 + C4)), + Eq(g(x), -C1 + C2*x**2*Rational(-1, 2) - C3*x + C4*x**3*Rational(-1, 6))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0]) + + eqs7 = [Eq(Derivative(f(x), (x, 2)), f(x) + g(x) + 1), + Eq(Derivative(g(x), (x, 2)), f(x) + g(x) + 1)] + sol7 = [Eq(f(x), -C1 - C2*x + sqrt(2)*C3*exp(sqrt(2)*x)/2 + sqrt(2)*C4*exp(-sqrt(2)*x)*Rational(-1, 2) + + Rational(-1, 2)), + Eq(g(x), C1 + C2*x + sqrt(2)*C3*exp(sqrt(2)*x)/2 + sqrt(2)*C4*exp(-sqrt(2)*x)*Rational(-1, 2) + + Rational(-1, 2))] + assert dsolve(eqs7) == sol7 + assert checksysodesol(eqs7, sol7) == (True, [0, 0]) + + eqs8 = [Eq(Derivative(f(x), (x, 2)), f(x) + g(x) + 1), + Eq(Derivative(g(x), (x, 2)), -f(x) - g(x) + 1)] + sol8 = [Eq(f(x), C1 + C2 + C4*x**3/6 + x**4/12 + x**2*(C2/2 + Rational(1, 2)) + x*(C3 + C4)), + Eq(g(x), -C1 - C3*x + C4*x**3*Rational(-1, 6) + x**4*Rational(-1, 12) - x**2*(C2/2 + Rational(-1, + 2)))] + assert dsolve(eqs8) == sol8 + assert checksysodesol(eqs8, sol8) == (True, [0, 0]) + + x, y = symbols('x, y', cls=Function) + t, l = symbols('t, l') + + eqs10 = [Eq(Derivative(x(t), (t, 2)), 5*x(t) + 43*y(t)), + Eq(Derivative(y(t), (t, 2)), x(t) + 9*y(t))] + sol10 = [Eq(x(t), C1*(61 - 9*sqrt(47))*sqrt(sqrt(47) + 7)*exp(-t*sqrt(sqrt(47) + 7))/2 + C2*sqrt(7 - + sqrt(47))*(61 + 9*sqrt(47))*exp(-t*sqrt(7 - sqrt(47)))/2 + C3*(61 - 9*sqrt(47))*sqrt(sqrt(47) + + 7)*exp(t*sqrt(sqrt(47) + 7))*Rational(-1, 2) + C4*sqrt(7 - sqrt(47))*(61 + 9*sqrt(47))*exp(t*sqrt(7 + - sqrt(47)))*Rational(-1, 2)), + Eq(y(t), C1*(7 - sqrt(47))*sqrt(sqrt(47) + 7)*exp(-t*sqrt(sqrt(47) + 7))*Rational(-1, 2) + C2*sqrt(7 + - sqrt(47))*(sqrt(47) + 7)*exp(-t*sqrt(7 - sqrt(47)))*Rational(-1, 2) + C3*(7 - + sqrt(47))*sqrt(sqrt(47) + 7)*exp(t*sqrt(sqrt(47) + 7))/2 + C4*sqrt(7 - sqrt(47))*(sqrt(47) + + 7)*exp(t*sqrt(7 - sqrt(47)))/2)] + assert dsolve(eqs10) == sol10 + assert checksysodesol(eqs10, sol10) == (True, [0, 0]) + + eqs11 = [Eq(7*x(t) + Derivative(x(t), (t, 2)) - 9*Derivative(y(t), t), 0), + Eq(7*y(t) + 9*Derivative(x(t), t) + Derivative(y(t), (t, 2)), 0)] + sol11 = [Eq(y(t), C1*(9 - sqrt(109))*sin(sqrt(2)*t*sqrt(9*sqrt(109) + 95)/2)/14 + C2*(9 - + sqrt(109))*cos(sqrt(2)*t*sqrt(9*sqrt(109) + 95)/2)*Rational(-1, 14) + C3*(9 + + sqrt(109))*sin(sqrt(2)*t*sqrt(95 - 9*sqrt(109))/2)/14 + C4*(9 + sqrt(109))*cos(sqrt(2)*t*sqrt(95 - + 9*sqrt(109))/2)*Rational(-1, 14)), + Eq(x(t), C1*(9 - sqrt(109))*cos(sqrt(2)*t*sqrt(9*sqrt(109) + 95)/2)*Rational(-1, 14) + C2*(9 - + sqrt(109))*sin(sqrt(2)*t*sqrt(9*sqrt(109) + 95)/2)*Rational(-1, 14) + C3*(9 + + sqrt(109))*cos(sqrt(2)*t*sqrt(95 - 9*sqrt(109))/2)/14 + C4*(9 + sqrt(109))*sin(sqrt(2)*t*sqrt(95 - + 9*sqrt(109))/2)/14)] + assert dsolve(eqs11) == sol11 + assert checksysodesol(eqs11, sol11) == (True, [0, 0]) + + # Euler Systems + # Note: To add examples of euler systems solver with non-homogeneous term. + eqs13 = [Eq(Derivative(f(t), (t, 2)), Derivative(f(t), t)/t + f(t)/t**2 + g(t)/t**2), + Eq(Derivative(g(t), (t, 2)), g(t)/t**2)] + sol13 = [Eq(f(t), C1*(sqrt(5) + 3)*Rational(-1, 2)*t**(Rational(1, 2) + + sqrt(5)*Rational(-1, 2)) + C2*t**(Rational(1, 2) + + sqrt(5)/2)*(3 - sqrt(5))*Rational(-1, 2) - C3*t**(1 - + sqrt(2))*(1 + sqrt(2)) - C4*t**(1 + sqrt(2))*(1 - sqrt(2))), + Eq(g(t), C1*(1 + sqrt(5))*Rational(-1, 2)*t**(Rational(1, 2) + + sqrt(5)*Rational(-1, 2)) + C2*t**(Rational(1, 2) + + sqrt(5)/2)*(1 - sqrt(5))*Rational(-1, 2))] + assert dsolve(eqs13) == sol13 + assert checksysodesol(eqs13, sol13) == (True, [0, 0]) + + # Solving systems using dsolve separately + eqs14 = [Eq(Derivative(f(t), (t, 2)), t*f(t)), + Eq(Derivative(g(t), (t, 2)), t*g(t))] + sol14 = [Eq(f(t), C1*airyai(t) + C2*airybi(t)), + Eq(g(t), C3*airyai(t) + C4*airybi(t))] + assert dsolve(eqs14) == sol14 + assert checksysodesol(eqs14, sol14) == (True, [0, 0]) + + + eqs15 = [Eq(Derivative(x(t), (t, 2)), t*(4*Derivative(x(t), t) + 8*Derivative(y(t), t))), + Eq(Derivative(y(t), (t, 2)), t*(12*Derivative(x(t), t) - 6*Derivative(y(t), t)))] + sol15 = [Eq(x(t), C1 - erf(sqrt(6)*t)*(sqrt(6)*sqrt(pi)*C2/33 + sqrt(6)*sqrt(pi)*C3*Rational(-1, 44)) + + erfi(sqrt(5)*t)*(sqrt(5)*sqrt(pi)*C2*Rational(2, 55) + sqrt(5)*sqrt(pi)*C3*Rational(4, 55))), + Eq(y(t), C4 + erf(sqrt(6)*t)*(sqrt(6)*sqrt(pi)*C2*Rational(2, 33) + sqrt(6)*sqrt(pi)*C3*Rational(-1, + 22)) + erfi(sqrt(5)*t)*(sqrt(5)*sqrt(pi)*C2*Rational(3, 110) + sqrt(5)*sqrt(pi)*C3*Rational(3, 55)))] + assert dsolve(eqs15) == sol15 + assert checksysodesol(eqs15, sol15) == (True, [0, 0]) + + +@slow +def test_higher_order_to_first_order_9(): + f, g = symbols('f g', cls=Function) + x = symbols('x') + + eqs9 = [f(x) + g(x) - 2*exp(I*x) + 2*Derivative(f(x), x) + Derivative(f(x), (x, 2)), + f(x) + g(x) - 2*exp(I*x) + 2*Derivative(g(x), x) + Derivative(g(x), (x, 2))] + sol9 = [Eq(f(x), -C1 + C4*exp(-2*x)/2 - (C2/2 - C3/2)*exp(-x)*cos(x) + + (C2/2 + C3/2)*exp(-x)*sin(x) + 2*((1 - 2*I)*exp(I*x)*sin(x)**2/5) + + 2*((1 - 2*I)*exp(I*x)*cos(x)**2/5)), + Eq(g(x), C1 - C4*exp(-2*x)/2 - (C2/2 - C3/2)*exp(-x)*cos(x) + + (C2/2 + C3/2)*exp(-x)*sin(x) + 2*((1 - 2*I)*exp(I*x)*sin(x)**2/5) + + 2*((1 - 2*I)*exp(I*x)*cos(x)**2/5))] + assert dsolve(eqs9) == sol9 + assert checksysodesol(eqs9, sol9) == (True, [0, 0]) + + +def test_higher_order_to_first_order_12(): + f, g = symbols('f g', cls=Function) + x = symbols('x') + + x, y = symbols('x, y', cls=Function) + t, l = symbols('t, l') + + eqs12 = [Eq(4*x(t) + Derivative(x(t), (t, 2)) + 8*Derivative(y(t), t), 0), + Eq(4*y(t) - 8*Derivative(x(t), t) + Derivative(y(t), (t, 2)), 0)] + sol12 = [Eq(y(t), C1*(2 - sqrt(5))*sin(2*t*sqrt(4*sqrt(5) + 9))*Rational(-1, 2) + C2*(2 - + sqrt(5))*cos(2*t*sqrt(4*sqrt(5) + 9))/2 + C3*(2 + sqrt(5))*sin(2*t*sqrt(9 - 4*sqrt(5)))*Rational(-1, + 2) + C4*(2 + sqrt(5))*cos(2*t*sqrt(9 - 4*sqrt(5)))/2), + Eq(x(t), C1*(2 - sqrt(5))*cos(2*t*sqrt(4*sqrt(5) + 9))*Rational(-1, 2) + C2*(2 - + sqrt(5))*sin(2*t*sqrt(4*sqrt(5) + 9))*Rational(-1, 2) + C3*(2 + sqrt(5))*cos(2*t*sqrt(9 - + 4*sqrt(5)))/2 + C4*(2 + sqrt(5))*sin(2*t*sqrt(9 - 4*sqrt(5)))/2)] + assert dsolve(eqs12) == sol12 + assert checksysodesol(eqs12, sol12) == (True, [0, 0]) + + +def test_second_order_to_first_order_2(): + f, g = symbols("f g", cls=Function) + x, t, x_, t_, d, a, m = symbols("x t x_ t_ d a m") + + eqs2 = [Eq(f(x).diff(x, 2), 2*(x*g(x).diff(x) - g(x))), + Eq(g(x).diff(x, 2),-2*(x*f(x).diff(x) - f(x)))] + sol2 = [Eq(f(x), C1*x + x*Integral(C2*exp(-x_)*exp(I*exp(2*x_))/2 + C2*exp(-x_)*exp(-I*exp(2*x_))/2 - + I*C3*exp(-x_)*exp(I*exp(2*x_))/2 + I*C3*exp(-x_)*exp(-I*exp(2*x_))/2, (x_, log(x)))), + Eq(g(x), C4*x + x*Integral(I*C2*exp(-x_)*exp(I*exp(2*x_))/2 - I*C2*exp(-x_)*exp(-I*exp(2*x_))/2 + + C3*exp(-x_)*exp(I*exp(2*x_))/2 + C3*exp(-x_)*exp(-I*exp(2*x_))/2, (x_, log(x))))] + # XXX: dsolve hangs for this in integration + assert dsolve_system(eqs2, simplify=False, doit=False) == [sol2] + assert checksysodesol(eqs2, sol2) == (True, [0, 0]) + + eqs3 = (Eq(diff(f(t),t,t), 9*t*diff(g(t),t)-9*g(t)), Eq(diff(g(t),t,t),7*t*diff(f(t),t)-7*f(t))) + sol3 = [Eq(f(t), C1*t + t*Integral(C2*exp(-t_)*exp(3*sqrt(7)*exp(2*t_)/2)/2 + C2*exp(-t_)* + exp(-3*sqrt(7)*exp(2*t_)/2)/2 + 3*sqrt(7)*C3*exp(-t_)*exp(3*sqrt(7)*exp(2*t_)/2)/14 - + 3*sqrt(7)*C3*exp(-t_)*exp(-3*sqrt(7)*exp(2*t_)/2)/14, (t_, log(t)))), + Eq(g(t), C4*t + t*Integral(sqrt(7)*C2*exp(-t_)*exp(3*sqrt(7)*exp(2*t_)/2)/6 - sqrt(7)*C2*exp(-t_)* + exp(-3*sqrt(7)*exp(2*t_)/2)/6 + C3*exp(-t_)*exp(3*sqrt(7)*exp(2*t_)/2)/2 + C3*exp(-t_)*exp(-3*sqrt(7)* + exp(2*t_)/2)/2, (t_, log(t))))] + # XXX: dsolve hangs for this in integration + assert dsolve_system(eqs3, simplify=False, doit=False) == [sol3] + assert checksysodesol(eqs3, sol3) == (True, [0, 0]) + + # Regression Test case for sympy#19238 + # https://github.com/sympy/sympy/issues/19238 + # Note: When the doit method is removed, these particular types of systems + # can be divided first so that we have lesser number of big matrices. + eqs5 = [Eq(Derivative(g(t), (t, 2)), a*m), + Eq(Derivative(f(t), (t, 2)), 0)] + sol5 = [Eq(g(t), C1 + C2*t + a*m*t**2/2), + Eq(f(t), C3 + C4*t)] + assert dsolve(eqs5) == sol5 + assert checksysodesol(eqs5, sol5) == (True, [0, 0]) + + # Type 2 + eqs6 = [Eq(Derivative(f(t), (t, 2)), f(t)/t**4), + Eq(Derivative(g(t), (t, 2)), d*g(t)/t**4)] + sol6 = [Eq(f(t), C1*sqrt(t**2)*exp(-1/t) - C2*sqrt(t**2)*exp(1/t)), + Eq(g(t), C3*sqrt(t**2)*exp(-sqrt(d)/t)*d**Rational(-1, 2) - + C4*sqrt(t**2)*exp(sqrt(d)/t)*d**Rational(-1, 2))] + assert dsolve(eqs6) == sol6 + assert checksysodesol(eqs6, sol6) == (True, [0, 0]) + + +@slow +def test_second_order_to_first_order_slow1(): + f, g = symbols("f g", cls=Function) + x, t, x_, t_, d, a, m = symbols("x t x_ t_ d a m") + + # Type 1 + + eqs1 = [Eq(f(x).diff(x, 2), 2/x *(x*g(x).diff(x) - g(x))), + Eq(g(x).diff(x, 2),-2/x *(x*f(x).diff(x) - f(x)))] + sol1 = [Eq(f(x), C1*x + 2*C2*x*Ci(2*x) - C2*sin(2*x) - 2*C3*x*Si(2*x) - C3*cos(2*x)), + Eq(g(x), -2*C2*x*Si(2*x) - C2*cos(2*x) - 2*C3*x*Ci(2*x) + C3*sin(2*x) + C4*x)] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + +def test_second_order_to_first_order_slow4(): + f, g = symbols("f g", cls=Function) + x, t, x_, t_, d, a, m = symbols("x t x_ t_ d a m") + + eqs4 = [Eq(Derivative(f(t), (t, 2)), t*sin(t)*Derivative(g(t), t) - g(t)*sin(t)), + Eq(Derivative(g(t), (t, 2)), t*sin(t)*Derivative(f(t), t) - f(t)*sin(t))] + sol4 = [Eq(f(t), C1*t + t*Integral(C2*exp(-t_)*exp(exp(t_)*cos(exp(t_)))*exp(-sin(exp(t_)))/2 + + C2*exp(-t_)*exp(-exp(t_)*cos(exp(t_)))*exp(sin(exp(t_)))/2 - C3*exp(-t_)*exp(exp(t_)*cos(exp(t_)))* + exp(-sin(exp(t_)))/2 + + C3*exp(-t_)*exp(-exp(t_)*cos(exp(t_)))*exp(sin(exp(t_)))/2, (t_, log(t)))), + Eq(g(t), C4*t + t*Integral(-C2*exp(-t_)*exp(exp(t_)*cos(exp(t_)))*exp(-sin(exp(t_)))/2 + + C2*exp(-t_)*exp(-exp(t_)*cos(exp(t_)))*exp(sin(exp(t_)))/2 + C3*exp(-t_)*exp(exp(t_)*cos(exp(t_)))* + exp(-sin(exp(t_)))/2 + C3*exp(-t_)*exp(-exp(t_)*cos(exp(t_)))*exp(sin(exp(t_)))/2, (t_, log(t))))] + # XXX: dsolve hangs for this in integration + assert dsolve_system(eqs4, simplify=False, doit=False) == [sol4] + assert checksysodesol(eqs4, sol4) == (True, [0, 0]) + + +def test_component_division(): + f, g, h, k = symbols('f g h k', cls=Function) + x = symbols("x") + funcs = [f(x), g(x), h(x), k(x)] + + eqs1 = [Eq(Derivative(f(x), x), 2*f(x)), + Eq(Derivative(g(x), x), f(x)), + Eq(Derivative(h(x), x), h(x)), + Eq(Derivative(k(x), x), h(x)**4 + k(x))] + sol1 = [Eq(f(x), 2*C1*exp(2*x)), + Eq(g(x), C1*exp(2*x) + C2), + Eq(h(x), C3*exp(x)), + Eq(k(x), C3**4*exp(4*x)/3 + C4*exp(x))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0, 0, 0]) + + components1 = {((Eq(Derivative(f(x), x), 2*f(x)),), (Eq(Derivative(g(x), x), f(x)),)), + ((Eq(Derivative(h(x), x), h(x)),), (Eq(Derivative(k(x), x), h(x)**4 + k(x)),))} + eqsdict1 = ({f(x): set(), g(x): {f(x)}, h(x): set(), k(x): {h(x)}}, + {f(x): Eq(Derivative(f(x), x), 2*f(x)), + g(x): Eq(Derivative(g(x), x), f(x)), + h(x): Eq(Derivative(h(x), x), h(x)), + k(x): Eq(Derivative(k(x), x), h(x)**4 + k(x))}) + graph1 = [{f(x), g(x), h(x), k(x)}, {(g(x), f(x)), (k(x), h(x))}] + assert {tuple(tuple(scc) for scc in wcc) for wcc in _component_division(eqs1, funcs, x)} == components1 + assert _eqs2dict(eqs1, funcs) == eqsdict1 + assert [set(element) for element in _dict2graph(eqsdict1[0])] == graph1 + + eqs2 = [Eq(Derivative(f(x), x), 2*f(x)), + Eq(Derivative(g(x), x), f(x)), + Eq(Derivative(h(x), x), h(x)), + Eq(Derivative(k(x), x), f(x)**4 + k(x))] + sol2 = [Eq(f(x), C1*exp(2*x)), + Eq(g(x), C1*exp(2*x)/2 + C2), + Eq(h(x), C3*exp(x)), + Eq(k(x), C1**4*exp(8*x)/7 + C4*exp(x))] + assert dsolve(eqs2) == sol2 + assert checksysodesol(eqs2, sol2) == (True, [0, 0, 0, 0]) + + components2 = {frozenset([(Eq(Derivative(f(x), x), 2*f(x)),), + (Eq(Derivative(g(x), x), f(x)),), + (Eq(Derivative(k(x), x), f(x)**4 + k(x)),)]), + frozenset([(Eq(Derivative(h(x), x), h(x)),)])} + eqsdict2 = ({f(x): set(), g(x): {f(x)}, h(x): set(), k(x): {f(x)}}, + {f(x): Eq(Derivative(f(x), x), 2*f(x)), + g(x): Eq(Derivative(g(x), x), f(x)), + h(x): Eq(Derivative(h(x), x), h(x)), + k(x): Eq(Derivative(k(x), x), f(x)**4 + k(x))}) + graph2 = [{f(x), g(x), h(x), k(x)}, {(g(x), f(x)), (k(x), f(x))}] + assert {frozenset(tuple(scc) for scc in wcc) for wcc in _component_division(eqs2, funcs, x)} == components2 + assert _eqs2dict(eqs2, funcs) == eqsdict2 + assert [set(element) for element in _dict2graph(eqsdict2[0])] == graph2 + + eqs3 = [Eq(Derivative(f(x), x), 2*f(x)), + Eq(Derivative(g(x), x), x + f(x)), + Eq(Derivative(h(x), x), h(x)), + Eq(Derivative(k(x), x), f(x)**4 + k(x))] + sol3 = [Eq(f(x), C1*exp(2*x)), + Eq(g(x), C1*exp(2*x)/2 + C2 + x**2/2), + Eq(h(x), C3*exp(x)), + Eq(k(x), C1**4*exp(8*x)/7 + C4*exp(x))] + assert dsolve(eqs3) == sol3 + assert checksysodesol(eqs3, sol3) == (True, [0, 0, 0, 0]) + + components3 = {frozenset([(Eq(Derivative(f(x), x), 2*f(x)),), + (Eq(Derivative(g(x), x), x + f(x)),), + (Eq(Derivative(k(x), x), f(x)**4 + k(x)),)]), + frozenset([(Eq(Derivative(h(x), x), h(x)),),])} + eqsdict3 = ({f(x): set(), g(x): {f(x)}, h(x): set(), k(x): {f(x)}}, + {f(x): Eq(Derivative(f(x), x), 2*f(x)), + g(x): Eq(Derivative(g(x), x), x + f(x)), + h(x): Eq(Derivative(h(x), x), h(x)), + k(x): Eq(Derivative(k(x), x), f(x)**4 + k(x))}) + graph3 = [{f(x), g(x), h(x), k(x)}, {(g(x), f(x)), (k(x), f(x))}] + assert {frozenset(tuple(scc) for scc in wcc) for wcc in _component_division(eqs3, funcs, x)} == components3 + assert _eqs2dict(eqs3, funcs) == eqsdict3 + assert [set(l) for l in _dict2graph(eqsdict3[0])] == graph3 + + # Note: To be uncommented when the default option to call dsolve first for + # single ODE system can be rearranged. This can be done after the doit + # option in dsolve is made False by default. + + eqs4 = [Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + Eq(Derivative(g(x), x), f(x) + x*g(x) + x), + Eq(Derivative(h(x), x), h(x)), + Eq(Derivative(k(x), x), f(x)**4 + k(x))] + sol4 = [Eq(f(x), (C1/2 - sqrt(2)*C2/2 - sqrt(2)*Integral(x*exp(-x**2/2 - sqrt(2)*x)/2 + x*exp(-x**2/2 +\ + sqrt(2)*x)/2, x)/2 + Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 - sqrt(2)*x*exp(-x**2/2 +\ + sqrt(2)*x)/2, x)/2)*exp(x**2/2 - sqrt(2)*x) + (C1/2 + sqrt(2)*C2/2 + sqrt(2)*Integral(x*exp(-x**2/2 + - sqrt(2)*x)/2 + x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2 + Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 + - sqrt(2)*x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2)*exp(x**2/2 + sqrt(2)*x)), + Eq(g(x), (-sqrt(2)*C1/4 + C2/2 + Integral(x*exp(-x**2/2 - sqrt(2)*x)/2 + x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2 -\ + sqrt(2)*Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 - sqrt(2)*x*exp(-x**2/2 + sqrt(2)*x)/2, + x)/4)*exp(x**2/2 - sqrt(2)*x) + (sqrt(2)*C1/4 + C2/2 + Integral(x*exp(-x**2/2 - sqrt(2)*x)/2 + + x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2 + sqrt(2)*Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 - + sqrt(2)*x*exp(-x**2/2 + sqrt(2)*x)/2, x)/4)*exp(x**2/2 + sqrt(2)*x)), + Eq(h(x), C3*exp(x)), + Eq(k(x), C4*exp(x) + exp(x)*Integral((C1*exp(x**2/2 - sqrt(2)*x)/2 + C1*exp(x**2/2 + sqrt(2)*x)/2 - + sqrt(2)*C2*exp(x**2/2 - sqrt(2)*x)/2 + sqrt(2)*C2*exp(x**2/2 + sqrt(2)*x)/2 - sqrt(2)*exp(x**2/2 - + sqrt(2)*x)*Integral(x*exp(-x**2/2 - sqrt(2)*x)/2 + x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2 + exp(x**2/2 - + sqrt(2)*x)*Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 - sqrt(2)*x*exp(-x**2/2 + sqrt(2)*x)/2, + x)/2 + sqrt(2)*exp(x**2/2 + sqrt(2)*x)*Integral(x*exp(-x**2/2 - sqrt(2)*x)/2 + x*exp(-x**2/2 + + sqrt(2)*x)/2, x)/2 + exp(x**2/2 + sqrt(2)*x)*Integral(sqrt(2)*x*exp(-x**2/2 - sqrt(2)*x)/2 - + sqrt(2)*x*exp(-x**2/2 + sqrt(2)*x)/2, x)/2)**4*exp(-x), x))] + components4 = {(frozenset([Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + Eq(Derivative(g(x), x), x*g(x) + x + f(x))]), + frozenset([Eq(Derivative(k(x), x), f(x)**4 + k(x)),])), + (frozenset([Eq(Derivative(h(x), x), h(x)),]),)} + eqsdict4 = ({f(x): {g(x)}, g(x): {f(x)}, h(x): set(), k(x): {f(x)}}, + {f(x): Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + g(x): Eq(Derivative(g(x), x), x*g(x) + x + f(x)), + h(x): Eq(Derivative(h(x), x), h(x)), + k(x): Eq(Derivative(k(x), x), f(x)**4 + k(x))}) + graph4 = [{f(x), g(x), h(x), k(x)}, {(f(x), g(x)), (g(x), f(x)), (k(x), f(x))}] + assert {tuple(frozenset(scc) for scc in wcc) for wcc in _component_division(eqs4, funcs, x)} == components4 + assert _eqs2dict(eqs4, funcs) == eqsdict4 + assert [set(element) for element in _dict2graph(eqsdict4[0])] == graph4 + # XXX: dsolve hangs in integration here: + assert dsolve_system(eqs4, simplify=False, doit=False) == [sol4] + assert checksysodesol(eqs4, sol4) == (True, [0, 0, 0, 0]) + + eqs5 = [Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + Eq(Derivative(g(x), x), x*g(x) + f(x)), + Eq(Derivative(h(x), x), h(x)), + Eq(Derivative(k(x), x), f(x)**4 + k(x))] + sol5 = [Eq(f(x), (C1/2 - sqrt(2)*C2/2)*exp(x**2/2 - sqrt(2)*x) + (C1/2 + sqrt(2)*C2/2)*exp(x**2/2 + sqrt(2)*x)), + Eq(g(x), (-sqrt(2)*C1/4 + C2/2)*exp(x**2/2 - sqrt(2)*x) + (sqrt(2)*C1/4 + C2/2)*exp(x**2/2 + sqrt(2)*x)), + Eq(h(x), C3*exp(x)), + Eq(k(x), C4*exp(x) + exp(x)*Integral((C1*exp(x**2/2 - sqrt(2)*x)/2 + C1*exp(x**2/2 + sqrt(2)*x)/2 - + sqrt(2)*C2*exp(x**2/2 - sqrt(2)*x)/2 + sqrt(2)*C2*exp(x**2/2 + sqrt(2)*x)/2)**4*exp(-x), x))] + components5 = {(frozenset([Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + Eq(Derivative(g(x), x), x*g(x) + f(x))]), + frozenset([Eq(Derivative(k(x), x), f(x)**4 + k(x)),])), + (frozenset([Eq(Derivative(h(x), x), h(x)),]),)} + eqsdict5 = ({f(x): {g(x)}, g(x): {f(x)}, h(x): set(), k(x): {f(x)}}, + {f(x): Eq(Derivative(f(x), x), x*f(x) + 2*g(x)), + g(x): Eq(Derivative(g(x), x), x*g(x) + f(x)), + h(x): Eq(Derivative(h(x), x), h(x)), + k(x): Eq(Derivative(k(x), x), f(x)**4 + k(x))}) + graph5 = [{f(x), g(x), h(x), k(x)}, {(f(x), g(x)), (g(x), f(x)), (k(x), f(x))}] + assert {tuple(frozenset(scc) for scc in wcc) for wcc in _component_division(eqs5, funcs, x)} == components5 + assert _eqs2dict(eqs5, funcs) == eqsdict5 + assert [set(element) for element in _dict2graph(eqsdict5[0])] == graph5 + # XXX: dsolve hangs in integration here: + assert dsolve_system(eqs5, simplify=False, doit=False) == [sol5] + assert checksysodesol(eqs5, sol5) == (True, [0, 0, 0, 0]) + + +def test_linodesolve(): + t, x, a = symbols("t x a") + f, g, h = symbols("f g h", cls=Function) + + # Testing the Errors + raises(ValueError, lambda: linodesolve(1, t)) + raises(ValueError, lambda: linodesolve(a, t)) + + A1 = Matrix([[1, 2], [2, 4], [4, 6]]) + raises(NonSquareMatrixError, lambda: linodesolve(A1, t)) + + A2 = Matrix([[1, 2, 1], [3, 1, 2]]) + raises(NonSquareMatrixError, lambda: linodesolve(A2, t)) + + # Testing auto functionality + func = [f(t), g(t)] + eq = [Eq(f(t).diff(t) + g(t).diff(t), g(t)), Eq(g(t).diff(t), f(t))] + ceq = canonical_odes(eq, func, t) + (A1, A0), b = linear_ode_to_matrix(ceq[0], func, t, 1) + A = A0 + sol = [C1*(-Rational(1, 2) + sqrt(5)/2)*exp(t*(-Rational(1, 2) + sqrt(5)/2)) + C2*(-sqrt(5)/2 - Rational(1, 2))* + exp(t*(-sqrt(5)/2 - Rational(1, 2))), + C1*exp(t*(-Rational(1, 2) + sqrt(5)/2)) + C2*exp(t*(-sqrt(5)/2 - Rational(1, 2)))] + assert constant_renumber(linodesolve(A, t), variables=Tuple(*eq).free_symbols) == sol + + # Testing the Errors + raises(ValueError, lambda: linodesolve(1, t, b=Matrix([t+1]))) + raises(ValueError, lambda: linodesolve(a, t, b=Matrix([log(t) + sin(t)]))) + + raises(ValueError, lambda: linodesolve(Matrix([7]), t, b=t**2)) + raises(ValueError, lambda: linodesolve(Matrix([a+10]), t, b=log(t)*cos(t))) + + raises(ValueError, lambda: linodesolve(7, t, b=t**2)) + raises(ValueError, lambda: linodesolve(a, t, b=log(t) + sin(t))) + + A1 = Matrix([[1, 2], [2, 4], [4, 6]]) + b1 = Matrix([t, 1, t**2]) + raises(NonSquareMatrixError, lambda: linodesolve(A1, t, b=b1)) + + A2 = Matrix([[1, 2, 1], [3, 1, 2]]) + b2 = Matrix([t, t**2]) + raises(NonSquareMatrixError, lambda: linodesolve(A2, t, b=b2)) + + raises(ValueError, lambda: linodesolve(A1[:2, :], t, b=b1)) + raises(ValueError, lambda: linodesolve(A1[:2, :], t, b=b1[:1])) + + # DOIT check + A1 = Matrix([[1, -1], [1, -1]]) + b1 = Matrix([15*t - 10, -15*t - 5]) + sol1 = [C1 + C2*t + C2 - 10*t**3 + 10*t**2 + t*(15*t**2 - 5*t) - 10*t, + C1 + C2*t - 10*t**3 - 5*t**2 + t*(15*t**2 - 5*t) - 5*t] + assert constant_renumber(linodesolve(A1, t, b=b1, type="type2", doit=True), + variables=[t]) == sol1 + + # Testing auto functionality + func = [f(t), g(t)] + eq = [Eq(f(t).diff(t) + g(t).diff(t), g(t) + t), Eq(g(t).diff(t), f(t))] + ceq = canonical_odes(eq, func, t) + (A1, A0), b = linear_ode_to_matrix(ceq[0], func, t, 1) + A = A0 + sol = [-C1*exp(-t/2 + sqrt(5)*t/2)/2 + sqrt(5)*C1*exp(-t/2 + sqrt(5)*t/2)/2 - sqrt(5)*C2*exp(-sqrt(5)*t/2 - + t/2)/2 - C2*exp(-sqrt(5)*t/2 - t/2)/2 - exp(-t/2 + sqrt(5)*t/2)*Integral(t*exp(-sqrt(5)*t/2 + + t/2)/(-5 + sqrt(5)) - sqrt(5)*t*exp(-sqrt(5)*t/2 + t/2)/(-5 + sqrt(5)), t)/2 + sqrt(5)*exp(-t/2 + + sqrt(5)*t/2)*Integral(t*exp(-sqrt(5)*t/2 + t/2)/(-5 + sqrt(5)) - sqrt(5)*t*exp(-sqrt(5)*t/2 + + t/2)/(-5 + sqrt(5)), t)/2 - sqrt(5)*exp(-sqrt(5)*t/2 - t/2)*Integral(-sqrt(5)*t*exp(t/2 + + sqrt(5)*t/2)/5, t)/2 - exp(-sqrt(5)*t/2 - t/2)*Integral(-sqrt(5)*t*exp(t/2 + sqrt(5)*t/2)/5, t)/2, + C1*exp(-t/2 + sqrt(5)*t/2) + C2*exp(-sqrt(5)*t/2 - t/2) + exp(-t/2 + + sqrt(5)*t/2)*Integral(t*exp(-sqrt(5)*t/2 + t/2)/(-5 + sqrt(5)) - sqrt(5)*t*exp(-sqrt(5)*t/2 + + t/2)/(-5 + sqrt(5)), t) + exp(-sqrt(5)*t/2 - + t/2)*Integral(-sqrt(5)*t*exp(t/2 + sqrt(5)*t/2)/5, t)] + assert constant_renumber(linodesolve(A, t, b=b), variables=[t]) == sol + + # non-homogeneous term assumed to be 0 + sol1 = [-C1*exp(-t/2 + sqrt(5)*t/2)/2 + sqrt(5)*C1*exp(-t/2 + sqrt(5)*t/2)/2 - sqrt(5)*C2*exp(-sqrt(5)*t/2 + - t/2)/2 - C2*exp(-sqrt(5)*t/2 - t/2)/2, + C1*exp(-t/2 + sqrt(5)*t/2) + C2*exp(-sqrt(5)*t/2 - t/2)] + assert constant_renumber(linodesolve(A, t, type="type2"), variables=[t]) == sol1 + + # Testing the Errors + raises(ValueError, lambda: linodesolve(t+10, t)) + raises(ValueError, lambda: linodesolve(a*t, t)) + + A1 = Matrix([[1, t], [-t, 1]]) + B1, _ = _is_commutative_anti_derivative(A1, t) + raises(NonSquareMatrixError, lambda: linodesolve(A1[:, :1], t, B=B1)) + raises(ValueError, lambda: linodesolve(A1, t, B=1)) + + A2 = Matrix([[t, t, t], [t, t, t], [t, t, t]]) + B2, _ = _is_commutative_anti_derivative(A2, t) + raises(NonSquareMatrixError, lambda: linodesolve(A2, t, B=B2[:2, :])) + raises(ValueError, lambda: linodesolve(A2, t, B=2)) + raises(ValueError, lambda: linodesolve(A2, t, B=B2, type="type31")) + + raises(ValueError, lambda: linodesolve(A1, t, B=B2)) + raises(ValueError, lambda: linodesolve(A2, t, B=B1)) + + # Testing auto functionality + func = [f(t), g(t)] + eq = [Eq(f(t).diff(t), f(t) + t*g(t)), Eq(g(t).diff(t), -t*f(t) + g(t))] + ceq = canonical_odes(eq, func, t) + (A1, A0), b = linear_ode_to_matrix(ceq[0], func, t, 1) + A = A0 + sol = [(C1/2 - I*C2/2)*exp(I*t**2/2 + t) + (C1/2 + I*C2/2)*exp(-I*t**2/2 + t), + (-I*C1/2 + C2/2)*exp(-I*t**2/2 + t) + (I*C1/2 + C2/2)*exp(I*t**2/2 + t)] + assert constant_renumber(linodesolve(A, t), variables=Tuple(*eq).free_symbols) == sol + assert constant_renumber(linodesolve(A, t, type="type3"), variables=Tuple(*eq).free_symbols) == sol + + A1 = Matrix([[t, 1], [t, -1]]) + raises(NotImplementedError, lambda: linodesolve(A1, t)) + + # Testing the Errors + raises(ValueError, lambda: linodesolve(t+10, t, b=Matrix([t+1]))) + raises(ValueError, lambda: linodesolve(a*t, t, b=Matrix([log(t) + sin(t)]))) + + raises(ValueError, lambda: linodesolve(Matrix([7*t]), t, b=t**2)) + raises(ValueError, lambda: linodesolve(Matrix([a + 10*log(t)]), t, b=log(t)*cos(t))) + + raises(ValueError, lambda: linodesolve(7*t, t, b=t**2)) + raises(ValueError, lambda: linodesolve(a*t**2, t, b=log(t) + sin(t))) + + A1 = Matrix([[1, t], [-t, 1]]) + b1 = Matrix([t, t ** 2]) + B1, _ = _is_commutative_anti_derivative(A1, t) + raises(NonSquareMatrixError, lambda: linodesolve(A1[:, :1], t, b=b1)) + + A2 = Matrix([[t, t, t], [t, t, t], [t, t, t]]) + b2 = Matrix([t, 1, t**2]) + B2, _ = _is_commutative_anti_derivative(A2, t) + raises(NonSquareMatrixError, lambda: linodesolve(A2[:2, :], t, b=b2)) + + raises(ValueError, lambda: linodesolve(A1, t, b=b2)) + raises(ValueError, lambda: linodesolve(A2, t, b=b1)) + + raises(ValueError, lambda: linodesolve(A1, t, b=b1, B=B2)) + raises(ValueError, lambda: linodesolve(A2, t, b=b2, B=B1)) + + # Testing auto functionality + func = [f(x), g(x), h(x)] + eq = [Eq(f(x).diff(x), x*(f(x) + g(x) + h(x)) + x), + Eq(g(x).diff(x), x*(f(x) + g(x) + h(x)) + x), + Eq(h(x).diff(x), x*(f(x) + g(x) + h(x)) + 1)] + ceq = canonical_odes(eq, func, x) + (A1, A0), b = linear_ode_to_matrix(ceq[0], func, x, 1) + A = A0 + _x1 = exp(-3*x**2/2) + _x2 = exp(3*x**2/2) + _x3 = Integral(2*_x1*x/3 + _x1/3 + x/3 - Rational(1, 3), x) + _x4 = 2*_x2*_x3/3 + _x5 = Integral(2*_x1*x/3 + _x1/3 - 2*x/3 + Rational(2, 3), x) + sol = [ + C1*_x2/3 - C1/3 + C2*_x2/3 - C2/3 + C3*_x2/3 + 2*C3/3 + _x2*_x5/3 + _x3/3 + _x4 - _x5/3, + C1*_x2/3 + 2*C1/3 + C2*_x2/3 - C2/3 + C3*_x2/3 - C3/3 + _x2*_x5/3 + _x3/3 + _x4 - _x5/3, + C1*_x2/3 - C1/3 + C2*_x2/3 + 2*C2/3 + C3*_x2/3 - C3/3 + _x2*_x5/3 - 2*_x3/3 + _x4 + 2*_x5/3, + ] + assert constant_renumber(linodesolve(A, x, b=b), variables=Tuple(*eq).free_symbols) == sol + assert constant_renumber(linodesolve(A, x, b=b, type="type4"), + variables=Tuple(*eq).free_symbols) == sol + + A1 = Matrix([[t, 1], [t, -1]]) + raises(NotImplementedError, lambda: linodesolve(A1, t, b=b1)) + + # non-homogeneous term not passed + sol1 = [-C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2), + -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2)] + assert constant_renumber(linodesolve(A, x, type="type4", doit=True), variables=Tuple(*eq).free_symbols) == sol1 + + +@slow +def test_linear_3eq_order1_type4_slow(): + x, y, z = symbols('x, y, z', cls=Function) + t = Symbol('t') + + f = t ** 3 + log(t) + g = t ** 2 + sin(t) + eq1 = (Eq(diff(x(t), t), (4 * f + g) * x(t) - f * y(t) - 2 * f * z(t)), + Eq(diff(y(t), t), 2 * f * x(t) + (f + g) * y(t) - 2 * f * z(t)), Eq(diff(z(t), t), 5 * f * x(t) + f * y( + t) + (-3 * f + g) * z(t))) + with dotprodsimp(True): + dsolve(eq1) + + +@slow +def test_linear_neq_order1_type2_slow1(): + i, r1, c1, r2, c2, t = symbols('i, r1, c1, r2, c2, t') + x1 = Function('x1') + x2 = Function('x2') + + eq1 = r1*c1*Derivative(x1(t), t) + x1(t) - x2(t) - r1*i + eq2 = r2*c1*Derivative(x1(t), t) + r2*c2*Derivative(x2(t), t) + x2(t) - r2*i + eq = [eq1, eq2] + + # XXX: Solution is too complicated + [sol] = dsolve_system(eq, simplify=False, doit=False) + assert checksysodesol(eq, sol) == (True, [0, 0]) + + +# Regression test case for issue #9204 +# https://github.com/sympy/sympy/issues/9204 +@tooslow +def test_linear_new_order1_type2_de_lorentz_slow_check(): + m = Symbol("m", real=True) + q = Symbol("q", real=True) + t = Symbol("t", real=True) + + e1, e2, e3 = symbols("e1:4", real=True) + b1, b2, b3 = symbols("b1:4", real=True) + v1, v2, v3 = symbols("v1:4", cls=Function, real=True) + + eqs = [ + -e1*q + m*Derivative(v1(t), t) - q*(-b2*v3(t) + b3*v2(t)), + -e2*q + m*Derivative(v2(t), t) - q*(b1*v3(t) - b3*v1(t)), + -e3*q + m*Derivative(v3(t), t) - q*(-b1*v2(t) + b2*v1(t)) + ] + sol = dsolve(eqs) + assert checksysodesol(eqs, sol) == (True, [0, 0, 0]) + + +# Regression test case for issue #14001 +# https://github.com/sympy/sympy/issues/14001 +@slow +def test_linear_neq_order1_type2_slow_check(): + RC, t, C, Vs, L, R1, V0, I0 = symbols("RC t C Vs L R1 V0 I0") + V = Function("V") + I = Function("I") + system = [Eq(V(t).diff(t), -1/RC*V(t) + I(t)/C), Eq(I(t).diff(t), -R1/L*I(t) - 1/L*V(t) + Vs/L)] + [sol] = dsolve_system(system, simplify=False, doit=False) + + assert checksysodesol(system, sol) == (True, [0, 0]) + + +def _linear_3eq_order1_type4_long(): + x, y, z = symbols('x, y, z', cls=Function) + t = Symbol('t') + + f = t ** 3 + log(t) + g = t ** 2 + sin(t) + + eq1 = (Eq(diff(x(t), t), (4*f + g)*x(t) - f*y(t) - 2*f*z(t)), + Eq(diff(y(t), t), 2*f*x(t) + (f + g)*y(t) - 2*f*z(t)), Eq(diff(z(t), t), 5*f*x(t) + f*y( + t) + (-3*f + g)*z(t))) + + dsolve_sol = dsolve(eq1) + dsolve_sol1 = [_simpsol(sol) for sol in dsolve_sol] + + x_1 = sqrt(-t**6 - 8*t**3*log(t) + 8*t**3 - 16*log(t)**2 + 32*log(t) - 16) + x_2 = sqrt(3) + x_3 = 8324372644*C1*x_1*x_2 + 4162186322*C2*x_1*x_2 - 8324372644*C3*x_1*x_2 + x_4 = 1 / (1903457163*t**3 + 3825881643*x_1*x_2 + 7613828652*log(t) - 7613828652) + x_5 = exp(t**3/3 + t*x_1*x_2/4 - cos(t)) + x_6 = exp(t**3/3 - t*x_1*x_2/4 - cos(t)) + x_7 = exp(t**4/2 + t**3/3 + 2*t*log(t) - 2*t - cos(t)) + x_8 = 91238*C1*x_1*x_2 + 91238*C2*x_1*x_2 - 91238*C3*x_1*x_2 + x_9 = 1 / (66049*t**3 - 50629*x_1*x_2 + 264196*log(t) - 264196) + x_10 = 50629 * C1 / 25189 + 37909*C2/25189 - 50629*C3/25189 - x_3*x_4 + x_11 = -50629*C1/25189 - 12720*C2/25189 + 50629*C3/25189 + x_3*x_4 + sol = [Eq(x(t), x_10*x_5 + x_11*x_6 + x_7*(C1 - C2)), Eq(y(t), x_10*x_5 + x_11*x_6), Eq(z(t), x_5*( + -424*C1/257 - 167*C2/257 + 424*C3/257 - x_8*x_9) + x_6*(167*C1/257 + 424*C2/257 - + 167*C3/257 + x_8*x_9) + x_7*(C1 - C2))] + + assert dsolve_sol1 == sol + assert checksysodesol(eq1, dsolve_sol1) == (True, [0, 0, 0]) + + +@slow +def test_neq_order1_type4_slow_check1(): + f, g = symbols("f g", cls=Function) + x = symbols("x") + + eqs = [Eq(diff(f(x), x), x*f(x) + x**2*g(x) + x), + Eq(diff(g(x), x), 2*x**2*f(x) + (x + 3*x**2)*g(x) + 1)] + sol = dsolve(eqs) + assert checksysodesol(eqs, sol) == (True, [0, 0]) + + +@slow +def test_neq_order1_type4_slow_check2(): + f, g, h = symbols("f, g, h", cls=Function) + x = Symbol("x") + + eqs = [ + Eq(Derivative(f(x), x), x*h(x) + f(x) + g(x) + 1), + Eq(Derivative(g(x), x), x*g(x) + f(x) + h(x) + 10), + Eq(Derivative(h(x), x), x*f(x) + x + g(x) + h(x)) + ] + with dotprodsimp(True): + sol = dsolve(eqs) + assert checksysodesol(eqs, sol) == (True, [0, 0, 0]) + + +def _neq_order1_type4_slow3(): + f, g = symbols("f g", cls=Function) + x = symbols("x") + + eqs = [ + Eq(Derivative(f(x), x), x*f(x) + g(x) + sin(x)), + Eq(Derivative(g(x), x), x**2 + x*g(x) - f(x)) + ] + sol = [ + Eq(f(x), (C1/2 - I*C2/2 - I*Integral(x**2*exp(-x**2/2 - I*x)/2 + + x**2*exp(-x**2/2 + I*x)/2 + I*exp(-x**2/2 - I*x)*sin(x)/2 - + I*exp(-x**2/2 + I*x)*sin(x)/2, x)/2 + Integral(-I*x**2*exp(-x**2/2 + - I*x)/2 + I*x**2*exp(-x**2/2 + I*x)/2 + exp(-x**2/2 - + I*x)*sin(x)/2 + exp(-x**2/2 + I*x)*sin(x)/2, x)/2)*exp(x**2/2 + + I*x) + (C1/2 + I*C2/2 + I*Integral(x**2*exp(-x**2/2 - I*x)/2 + + x**2*exp(-x**2/2 + I*x)/2 + I*exp(-x**2/2 - I*x)*sin(x)/2 - + I*exp(-x**2/2 + I*x)*sin(x)/2, x)/2 + Integral(-I*x**2*exp(-x**2/2 + - I*x)/2 + I*x**2*exp(-x**2/2 + I*x)/2 + exp(-x**2/2 - + I*x)*sin(x)/2 + exp(-x**2/2 + I*x)*sin(x)/2, x)/2)*exp(x**2/2 - + I*x)), + Eq(g(x), (-I*C1/2 + C2/2 + Integral(x**2*exp(-x**2/2 - I*x)/2 + + x**2*exp(-x**2/2 + I*x)/2 + I*exp(-x**2/2 - I*x)*sin(x)/2 - + I*exp(-x**2/2 + I*x)*sin(x)/2, x)/2 - + I*Integral(-I*x**2*exp(-x**2/2 - I*x)/2 + I*x**2*exp(-x**2/2 + + I*x)/2 + exp(-x**2/2 - I*x)*sin(x)/2 + exp(-x**2/2 + + I*x)*sin(x)/2, x)/2)*exp(x**2/2 - I*x) + (I*C1/2 + C2/2 + + Integral(x**2*exp(-x**2/2 - I*x)/2 + x**2*exp(-x**2/2 + I*x)/2 + + I*exp(-x**2/2 - I*x)*sin(x)/2 - I*exp(-x**2/2 + I*x)*sin(x)/2, + x)/2 + I*Integral(-I*x**2*exp(-x**2/2 - I*x)/2 + + I*x**2*exp(-x**2/2 + I*x)/2 + exp(-x**2/2 - I*x)*sin(x)/2 + + exp(-x**2/2 + I*x)*sin(x)/2, x)/2)*exp(x**2/2 + I*x)) + ] + + return eqs, sol + + +def test_neq_order1_type4_slow3(): + eqs, sol = _neq_order1_type4_slow3() + assert dsolve_system(eqs, simplify=False, doit=False) == [sol] + # XXX: dsolve gives an error in integration: + # assert dsolve(eqs) == sol + # https://github.com/sympy/sympy/issues/20155 + + +@slow +def test_neq_order1_type4_slow_check3(): + eqs, sol = _neq_order1_type4_slow3() + assert checksysodesol(eqs, sol) == (True, [0, 0]) + + +@tooslow +@XFAIL +def test_linear_3eq_order1_type4_long_dsolve_slow_xfail(): + eq, sol = _linear_3eq_order1_type4_long() + + dsolve_sol = dsolve(eq) + dsolve_sol1 = [_simpsol(sol) for sol in dsolve_sol] + + assert dsolve_sol1 == sol + + +@tooslow +def test_linear_3eq_order1_type4_long_dsolve_dotprodsimp(): + eq, sol = _linear_3eq_order1_type4_long() + + # XXX: Only works with dotprodsimp see + # test_linear_3eq_order1_type4_long_dsolve_slow_xfail which is too slow + with dotprodsimp(True): + dsolve_sol = dsolve(eq) + + dsolve_sol1 = [_simpsol(sol) for sol in dsolve_sol] + assert dsolve_sol1 == sol + + +@tooslow +def test_linear_3eq_order1_type4_long_check(): + eq, sol = _linear_3eq_order1_type4_long() + assert checksysodesol(eq, sol) == (True, [0, 0, 0]) + + +def test_dsolve_system(): + f, g = symbols("f g", cls=Function) + x = symbols("x") + eqs = [Eq(f(x).diff(x), f(x) + g(x)), Eq(g(x).diff(x), f(x) + g(x))] + funcs = [f(x), g(x)] + + sol = [[Eq(f(x), -C1 + C2*exp(2*x)), Eq(g(x), C1 + C2*exp(2*x))]] + assert dsolve_system(eqs, funcs=funcs, t=x, doit=True) == sol + + raises(ValueError, lambda: dsolve_system(1)) + raises(ValueError, lambda: dsolve_system(eqs, 1)) + raises(ValueError, lambda: dsolve_system(eqs, funcs, 1)) + raises(ValueError, lambda: dsolve_system(eqs, funcs[:1], x)) + + eq = (Eq(f(x).diff(x), 12 * f(x) - 6 * g(x)), Eq(g(x).diff(x) ** 2, 11 * f(x) + 3 * g(x))) + raises(NotImplementedError, lambda: dsolve_system(eq) == ([], [])) + + raises(NotImplementedError, lambda: dsolve_system(eq, funcs=[f(x), g(x)]) == ([], [])) + raises(NotImplementedError, lambda: dsolve_system(eq, funcs=[f(x), g(x)], t=x) == ([], [])) + raises(NotImplementedError, lambda: dsolve_system(eq, funcs=[f(x), g(x)], t=x, ics={f(0): 1, g(0): 1}) == ([], [])) + raises(NotImplementedError, lambda: dsolve_system(eq, t=x, ics={f(0): 1, g(0): 1}) == ([], [])) + raises(NotImplementedError, lambda: dsolve_system(eq, ics={f(0): 1, g(0): 1}) == ([], [])) + raises(NotImplementedError, lambda: dsolve_system(eq, funcs=[f(x), g(x)], ics={f(0): 1, g(0): 1}) == ([], [])) + +def test_dsolve(): + + f, g = symbols('f g', cls=Function) + x, y = symbols('x y') + + eqs = [f(x).diff(x) - x, f(x).diff(x) + x] + with raises(ValueError): + dsolve(eqs) + + eqs = [f(x, y).diff(x)] + with raises(ValueError): + dsolve(eqs) + + eqs = [f(x, y).diff(x)+g(x).diff(x), g(x).diff(x)] + with raises(ValueError): + dsolve(eqs) + + +@slow +def test_higher_order1_slow1(): + x, y = symbols("x y", cls=Function) + t = symbols("t") + + eq = [ + Eq(diff(x(t),t,t), (log(t)+t**2)*diff(x(t),t)+(log(t)+t**2)*3*diff(y(t),t)), + Eq(diff(y(t),t,t), (log(t)+t**2)*2*diff(x(t),t)+(log(t)+t**2)*9*diff(y(t),t)) + ] + sol, = dsolve_system(eq, simplify=False, doit=False) + # The solution is too long to write out explicitly and checkodesol is too + # slow so we test for particular values of t: + for e in eq: + res = (e.lhs - e.rhs).subs({sol[0].lhs:sol[0].rhs, sol[1].lhs:sol[1].rhs}) + res = res.subs({d: d.doit(deep=False) for d in res.atoms(Derivative)}) + assert ratsimp(res.subs(t, 1)) == 0 + + +def test_second_order_type2_slow1(): + x, y, z = symbols('x, y, z', cls=Function) + t, l = symbols('t, l') + + eqs1 = [Eq(Derivative(x(t), (t, 2)), t*(2*x(t) + y(t))), + Eq(Derivative(y(t), (t, 2)), t*(-x(t) + 2*y(t)))] + sol1 = [Eq(x(t), I*C1*airyai(t*(2 - I)**(S(1)/3)) + I*C2*airybi(t*(2 - I)**(S(1)/3)) - I*C3*airyai(t*(2 + + I)**(S(1)/3)) - I*C4*airybi(t*(2 + I)**(S(1)/3))), + Eq(y(t), C1*airyai(t*(2 - I)**(S(1)/3)) + C2*airybi(t*(2 - I)**(S(1)/3)) + C3*airyai(t*(2 + I)**(S(1)/3)) + + C4*airybi(t*(2 + I)**(S(1)/3)))] + assert dsolve(eqs1) == sol1 + assert checksysodesol(eqs1, sol1) == (True, [0, 0]) + + +@tooslow +@XFAIL +def test_nonlinear_3eq_order1_type1(): + a, b, c = symbols('a b c') + + eqs = [ + a * f(x).diff(x) - (b - c) * g(x) * h(x), + b * g(x).diff(x) - (c - a) * h(x) * f(x), + c * h(x).diff(x) - (a - b) * f(x) * g(x), + ] + + assert dsolve(eqs) # NotImplementedError + + +@XFAIL +def test_nonlinear_3eq_order1_type4(): + eqs = [ + Eq(f(x).diff(x), (2*h(x)*g(x) - 3*g(x)*h(x))), + Eq(g(x).diff(x), (4*f(x)*h(x) - 2*h(x)*f(x))), + Eq(h(x).diff(x), (3*g(x)*f(x) - 4*f(x)*g(x))), + ] + dsolve(eqs) # KeyError when matching + # sol = ? + # assert dsolve_sol == sol + # assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0]) + + +@tooslow +@XFAIL +def test_nonlinear_3eq_order1_type3(): + eqs = [ + Eq(f(x).diff(x), (2*f(x)**2 - 3 )), + Eq(g(x).diff(x), (4 - 2*h(x) )), + Eq(h(x).diff(x), (3*h(x) - 4*f(x)**2)), + ] + dsolve(eqs) # Not sure if this finishes... + # sol = ? + # assert dsolve_sol == sol + # assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0]) + + +@XFAIL +def test_nonlinear_3eq_order1_type5(): + eqs = [ + Eq(f(x).diff(x), f(x)*(2*f(x) - 3*g(x))), + Eq(g(x).diff(x), g(x)*(4*g(x) - 2*h(x))), + Eq(h(x).diff(x), h(x)*(3*h(x) - 4*f(x))), + ] + dsolve(eqs) # KeyError + # sol = ? + # assert dsolve_sol == sol + # assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0]) + + +def test_linear_2eq_order1(): + x, y, z = symbols('x, y, z', cls=Function) + k, l, m, n = symbols('k, l, m, n', Integer=True) + t = Symbol('t') + x0, y0 = symbols('x0, y0', cls=Function) + + eq1 = (Eq(diff(x(t),t), x(t) + y(t) + 9), Eq(diff(y(t),t), 2*x(t) + 5*y(t) + 23)) + sol1 = [Eq(x(t), C1*exp(t*(sqrt(6) + 3)) + C2*exp(t*(-sqrt(6) + 3)) - Rational(22, 3)), \ + Eq(y(t), C1*(2 + sqrt(6))*exp(t*(sqrt(6) + 3)) + C2*(-sqrt(6) + 2)*exp(t*(-sqrt(6) + 3)) - Rational(5, 3))] + assert checksysodesol(eq1, sol1) == (True, [0, 0]) + + eq2 = (Eq(diff(x(t),t), x(t) + y(t) + 81), Eq(diff(y(t),t), -2*x(t) + y(t) + 23)) + sol2 = [Eq(x(t), (C1*cos(sqrt(2)*t) + C2*sin(sqrt(2)*t))*exp(t) - Rational(58, 3)), \ + Eq(y(t), (-sqrt(2)*C1*sin(sqrt(2)*t) + sqrt(2)*C2*cos(sqrt(2)*t))*exp(t) - Rational(185, 3))] + assert checksysodesol(eq2, sol2) == (True, [0, 0]) + + eq3 = (Eq(diff(x(t),t), 5*t*x(t) + 2*y(t)), Eq(diff(y(t),t), 2*x(t) + 5*t*y(t))) + sol3 = [Eq(x(t), (C1*exp(2*t) + C2*exp(-2*t))*exp(Rational(5, 2)*t**2)), \ + Eq(y(t), (C1*exp(2*t) - C2*exp(-2*t))*exp(Rational(5, 2)*t**2))] + assert checksysodesol(eq3, sol3) == (True, [0, 0]) + + eq4 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t))) + sol4 = [Eq(x(t), (C1*cos((t**3)/3) + C2*sin((t**3)/3))*exp(Rational(5, 2)*t**2)), \ + Eq(y(t), (-C1*sin((t**3)/3) + C2*cos((t**3)/3))*exp(Rational(5, 2)*t**2))] + assert checksysodesol(eq4, sol4) == (True, [0, 0]) + + eq5 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + (5*t+9*t**2)*y(t))) + sol5 = [Eq(x(t), (C1*exp((sqrt(77)/2 + Rational(9, 2))*(t**3)/3) + \ + C2*exp((-sqrt(77)/2 + Rational(9, 2))*(t**3)/3))*exp(Rational(5, 2)*t**2)), \ + Eq(y(t), (C1*(sqrt(77)/2 + Rational(9, 2))*exp((sqrt(77)/2 + Rational(9, 2))*(t**3)/3) + \ + C2*(-sqrt(77)/2 + Rational(9, 2))*exp((-sqrt(77)/2 + Rational(9, 2))*(t**3)/3))*exp(Rational(5, 2)*t**2))] + assert checksysodesol(eq5, sol5) == (True, [0, 0]) + + eq6 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), (1-t**2)*x(t) + (5*t+9*t**2)*y(t))) + sol6 = [Eq(x(t), C1*x0(t) + C2*x0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t)), \ + Eq(y(t), C1*y0(t) + C2*(y0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t) + \ + exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)))] + s = dsolve(eq6) + assert s == sol6 # too complicated to test with subs and simplify + # assert checksysodesol(eq10, sol10) == (True, [0, 0]) # this one fails + + +def test_nonlinear_2eq_order1(): + x, y, z = symbols('x, y, z', cls=Function) + t = Symbol('t') + eq1 = (Eq(diff(x(t),t),x(t)*y(t)**3), Eq(diff(y(t),t),y(t)**5)) + sol1 = [ + Eq(x(t), C1*exp((-1/(4*C2 + 4*t))**(Rational(-1, 4)))), + Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), C1*exp(-1/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), C1*exp(-I/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), C1*exp(I/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))] + assert dsolve(eq1) == sol1 + assert checksysodesol(eq1, sol1) == (True, [0, 0]) + + eq2 = (Eq(diff(x(t),t), exp(3*x(t))*y(t)**3),Eq(diff(y(t),t), y(t)**5)) + sol2 = [ + Eq(x(t), -log(C1 - 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), + Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), -log(C1 + 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), + Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), -log(C1 + 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), + Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), -log(C1 - 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3), + Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))] + assert dsolve(eq2) == sol2 + assert checksysodesol(eq2, sol2) == (True, [0, 0]) + + eq3 = (Eq(diff(x(t),t), y(t)*x(t)), Eq(diff(y(t),t), x(t)**3)) + tt = Rational(2, 3) + sol3 = [ + Eq(x(t), 6**tt/(6*(-sinh(sqrt(C1)*(C2 + t)/2)/sqrt(C1))**tt)), + Eq(y(t), sqrt(C1 + C1/sinh(sqrt(C1)*(C2 + t)/2)**2)/3)] + assert dsolve(eq3) == sol3 + # FIXME: assert checksysodesol(eq3, sol3) == (True, [0, 0]) + + eq4 = (Eq(diff(x(t),t),x(t)*y(t)*sin(t)**2), Eq(diff(y(t),t),y(t)**2*sin(t)**2)) + sol4 = {Eq(x(t), -2*exp(C1)/(C2*exp(C1) + t - sin(2*t)/2)), Eq(y(t), -2/(C1 + t - sin(2*t)/2))} + assert dsolve(eq4) == sol4 + # FIXME: assert checksysodesol(eq4, sol4) == (True, [0, 0]) + + eq5 = (Eq(x(t),t*diff(x(t),t)+diff(x(t),t)*diff(y(t),t)), Eq(y(t),t*diff(y(t),t)+diff(y(t),t)**2)) + sol5 = {Eq(x(t), C1*C2 + C1*t), Eq(y(t), C2**2 + C2*t)} + assert dsolve(eq5) == sol5 + assert checksysodesol(eq5, sol5) == (True, [0, 0]) + + eq6 = (Eq(diff(x(t),t),x(t)**2*y(t)**3), Eq(diff(y(t),t),y(t)**5)) + sol6 = [ + Eq(x(t), 1/(C1 - 1/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), 1/(C1 + (-1/(4*C2 + 4*t))**(Rational(-1, 4)))), + Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), 1/(C1 + I/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)), + Eq(x(t), 1/(C1 - I/(-1/(4*C2 + 4*t))**Rational(1, 4))), + Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))] + assert dsolve(eq6) == sol6 + assert checksysodesol(eq6, sol6) == (True, [0, 0]) + + +@slow +def test_nonlinear_3eq_order1(): + x, y, z = symbols('x, y, z', cls=Function) + t, u = symbols('t u') + eq1 = (4*diff(x(t),t) + 2*y(t)*z(t), 3*diff(y(t),t) - z(t)*x(t), 5*diff(z(t),t) - x(t)*y(t)) + sol1 = [Eq(4*Integral(1/(sqrt(-4*u**2 - 3*C1 + C2)*sqrt(-4*u**2 + 5*C1 - C2)), (u, x(t))), + C3 - sqrt(15)*t/15), Eq(3*Integral(1/(sqrt(-6*u**2 - C1 + 5*C2)*sqrt(3*u**2 + C1 - 4*C2)), + (u, y(t))), C3 + sqrt(5)*t/10), Eq(5*Integral(1/(sqrt(-10*u**2 - 3*C1 + C2)* + sqrt(5*u**2 + 4*C1 - C2)), (u, z(t))), C3 + sqrt(3)*t/6)] + assert [i.dummy_eq(j) for i, j in zip(dsolve(eq1), sol1)] + # FIXME: assert checksysodesol(eq1, sol1) == (True, [0, 0, 0]) + + eq2 = (4*diff(x(t),t) + 2*y(t)*z(t)*sin(t), 3*diff(y(t),t) - z(t)*x(t)*sin(t), 5*diff(z(t),t) - x(t)*y(t)*sin(t)) + sol2 = [Eq(3*Integral(1/(sqrt(-6*u**2 - C1 + 5*C2)*sqrt(3*u**2 + C1 - 4*C2)), (u, x(t))), C3 + + sqrt(5)*cos(t)/10), Eq(4*Integral(1/(sqrt(-4*u**2 - 3*C1 + C2)*sqrt(-4*u**2 + 5*C1 - C2)), + (u, y(t))), C3 - sqrt(15)*cos(t)/15), Eq(5*Integral(1/(sqrt(-10*u**2 - 3*C1 + C2)* + sqrt(5*u**2 + 4*C1 - C2)), (u, z(t))), C3 + sqrt(3)*cos(t)/6)] + assert [i.dummy_eq(j) for i, j in zip(dsolve(eq2), sol2)] + # FIXME: assert checksysodesol(eq2, sol2) == (True, [0, 0, 0]) + + +def test_C1_function_9239(): + t = Symbol('t') + C1 = Function('C1') + C2 = Function('C2') + C3 = Symbol('C3') + C4 = Symbol('C4') + eq = (Eq(diff(C1(t), t), 9*C2(t)), Eq(diff(C2(t), t), 12*C1(t))) + sol = [Eq(C1(t), 9*C3*exp(6*sqrt(3)*t) + 9*C4*exp(-6*sqrt(3)*t)), + Eq(C2(t), 6*sqrt(3)*C3*exp(6*sqrt(3)*t) - 6*sqrt(3)*C4*exp(-6*sqrt(3)*t))] + assert checksysodesol(eq, sol) == (True, [0, 0]) + + +def test_dsolve_linsystem_symbol(): + eps = Symbol('epsilon', positive=True) + eq1 = (Eq(diff(f(x), x), -eps*g(x)), Eq(diff(g(x), x), eps*f(x))) + sol1 = [Eq(f(x), -C1*eps*cos(eps*x) - C2*eps*sin(eps*x)), + Eq(g(x), -C1*eps*sin(eps*x) + C2*eps*cos(eps*x))] + assert checksysodesol(eq1, sol1) == (True, [0, 0]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/pde.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/pde.py new file mode 100644 index 0000000000000000000000000000000000000000..791ac67ae681ea952ea6e1dabacb7220d1843ebc --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/pde.py @@ -0,0 +1,966 @@ +""" +This module contains pdsolve() and different helper functions that it +uses. It is heavily inspired by the ode module and hence the basic +infrastructure remains the same. + +**Functions in this module** + + These are the user functions in this module: + + - pdsolve() - Solves PDE's + - classify_pde() - Classifies PDEs into possible hints for dsolve(). + - pde_separate() - Separate variables in partial differential equation either by + additive or multiplicative separation approach. + + These are the helper functions in this module: + + - pde_separate_add() - Helper function for searching additive separable solutions. + - pde_separate_mul() - Helper function for searching multiplicative + separable solutions. + +**Currently implemented solver methods** + +The following methods are implemented for solving partial differential +equations. See the docstrings of the various pde_hint() functions for +more information on each (run help(pde)): + + - 1st order linear homogeneous partial differential equations + with constant coefficients. + - 1st order linear general partial differential equations + with constant coefficients. + - 1st order linear partial differential equations with + variable coefficients. + +""" +from functools import reduce + +from itertools import combinations_with_replacement +from sympy.simplify import simplify # type: ignore +from sympy.core import Add, S +from sympy.core.function import Function, expand, AppliedUndef, Subs +from sympy.core.relational import Equality, Eq +from sympy.core.symbol import Symbol, Wild, symbols +from sympy.functions import exp +from sympy.integrals.integrals import Integral, integrate +from sympy.utilities.iterables import has_dups, is_sequence +from sympy.utilities.misc import filldedent + +from sympy.solvers.deutils import _preprocess, ode_order, _desolve +from sympy.solvers.solvers import solve +from sympy.simplify.radsimp import collect + +import operator + + +allhints = ( + "1st_linear_constant_coeff_homogeneous", + "1st_linear_constant_coeff", + "1st_linear_constant_coeff_Integral", + "1st_linear_variable_coeff" + ) + + +def pdsolve(eq, func=None, hint='default', dict=False, solvefun=None, **kwargs): + """ + Solves any (supported) kind of partial differential equation. + + **Usage** + + pdsolve(eq, f(x,y), hint) -> Solve partial differential equation + eq for function f(x,y), using method hint. + + **Details** + + ``eq`` can be any supported partial differential equation (see + the pde docstring for supported methods). This can either + be an Equality, or an expression, which is assumed to be + equal to 0. + + ``f(x,y)`` is a function of two variables whose derivatives in that + variable make up the partial differential equation. In many + cases it is not necessary to provide this; it will be autodetected + (and an error raised if it could not be detected). + + ``hint`` is the solving method that you want pdsolve to use. Use + classify_pde(eq, f(x,y)) to get all of the possible hints for + a PDE. The default hint, 'default', will use whatever hint + is returned first by classify_pde(). See Hints below for + more options that you can use for hint. + + ``solvefun`` is the convention used for arbitrary functions returned + by the PDE solver. If not set by the user, it is set by default + to be F. + + **Hints** + + Aside from the various solving methods, there are also some + meta-hints that you can pass to pdsolve(): + + "default": + This uses whatever hint is returned first by + classify_pde(). This is the default argument to + pdsolve(). + + "all": + To make pdsolve apply all relevant classification hints, + use pdsolve(PDE, func, hint="all"). This will return a + dictionary of hint:solution terms. If a hint causes + pdsolve to raise the NotImplementedError, value of that + hint's key will be the exception object raised. The + dictionary will also include some special keys: + + - order: The order of the PDE. See also ode_order() in + deutils.py + - default: The solution that would be returned by + default. This is the one produced by the hint that + appears first in the tuple returned by classify_pde(). + + "all_Integral": + This is the same as "all", except if a hint also has a + corresponding "_Integral" hint, it only returns the + "_Integral" hint. This is useful if "all" causes + pdsolve() to hang because of a difficult or impossible + integral. This meta-hint will also be much faster than + "all", because integrate() is an expensive routine. + + See also the classify_pde() docstring for more info on hints, + and the pde docstring for a list of all supported hints. + + **Tips** + - You can declare the derivative of an unknown function this way: + + >>> from sympy import Function, Derivative + >>> from sympy.abc import x, y # x and y are the independent variables + >>> f = Function("f")(x, y) # f is a function of x and y + >>> # fx will be the partial derivative of f with respect to x + >>> fx = Derivative(f, x) + >>> # fy will be the partial derivative of f with respect to y + >>> fy = Derivative(f, y) + + - See test_pde.py for many tests, which serves also as a set of + examples for how to use pdsolve(). + - pdsolve always returns an Equality class (except for the case + when the hint is "all" or "all_Integral"). Note that it is not possible + to get an explicit solution for f(x, y) as in the case of ODE's + - Do help(pde.pde_hintname) to get help more information on a + specific hint + + + Examples + ======== + + >>> from sympy.solvers.pde import pdsolve + >>> from sympy import Function, Eq + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> u = f(x, y) + >>> ux = u.diff(x) + >>> uy = u.diff(y) + >>> eq = Eq(1 + (2*(ux/u)) + (3*(uy/u)), 0) + >>> pdsolve(eq) + Eq(f(x, y), F(3*x - 2*y)*exp(-2*x/13 - 3*y/13)) + + """ + + if not solvefun: + solvefun = Function('F') + + # See the docstring of _desolve for more details. + hints = _desolve(eq, func=func, hint=hint, simplify=True, + type='pde', **kwargs) + eq = hints.pop('eq', False) + all_ = hints.pop('all', False) + + if all_: + # TODO : 'best' hint should be implemented when adequate + # number of hints are added. + pdedict = {} + failed_hints = {} + gethints = classify_pde(eq, dict=True) + pdedict.update({'order': gethints['order'], + 'default': gethints['default']}) + for hint in hints: + try: + rv = _helper_simplify(eq, hint, hints[hint]['func'], + hints[hint]['order'], hints[hint][hint], solvefun) + except NotImplementedError as detail: + failed_hints[hint] = detail + else: + pdedict[hint] = rv + pdedict.update(failed_hints) + return pdedict + + else: + return _helper_simplify(eq, hints['hint'], hints['func'], + hints['order'], hints[hints['hint']], solvefun) + + +def _helper_simplify(eq, hint, func, order, match, solvefun): + """Helper function of pdsolve that calls the respective + pde functions to solve for the partial differential + equations. This minimizes the computation in + calling _desolve multiple times. + """ + solvefunc = globals()["pde_" + hint.removesuffix("_Integral")] + return _handle_Integral(solvefunc(eq, func, order, + match, solvefun), func, order, hint) + + +def _handle_Integral(expr, func, order, hint): + r""" + Converts a solution with integrals in it into an actual solution. + + Simplifies the integral mainly using doit() + """ + if hint.endswith("_Integral"): + return expr + + elif hint == "1st_linear_constant_coeff": + return simplify(expr.doit()) + + else: + return expr + + +def classify_pde(eq, func=None, dict=False, *, prep=True, **kwargs): + """ + Returns a tuple of possible pdsolve() classifications for a PDE. + + The tuple is ordered so that first item is the classification that + pdsolve() uses to solve the PDE by default. In general, + classifications near the beginning of the list will produce + better solutions faster than those near the end, though there are + always exceptions. To make pdsolve use a different classification, + use pdsolve(PDE, func, hint=). See also the pdsolve() + docstring for different meta-hints you can use. + + If ``dict`` is true, classify_pde() will return a dictionary of + hint:match expression terms. This is intended for internal use by + pdsolve(). Note that because dictionaries are ordered arbitrarily, + this will most likely not be in the same order as the tuple. + + You can get help on different hints by doing help(pde.pde_hintname), + where hintname is the name of the hint without "_Integral". + + See sympy.pde.allhints or the sympy.pde docstring for a list of all + supported hints that can be returned from classify_pde. + + + Examples + ======== + + >>> from sympy.solvers.pde import classify_pde + >>> from sympy import Function, Eq + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> u = f(x, y) + >>> ux = u.diff(x) + >>> uy = u.diff(y) + >>> eq = Eq(1 + (2*(ux/u)) + (3*(uy/u)), 0) + >>> classify_pde(eq) + ('1st_linear_constant_coeff_homogeneous',) + """ + + if func and len(func.args) != 2: + raise NotImplementedError("Right now only partial " + "differential equations of two variables are supported") + + if prep or func is None: + prep, func_ = _preprocess(eq, func) + if func is None: + func = func_ + + if isinstance(eq, Equality): + if eq.rhs != 0: + return classify_pde(eq.lhs - eq.rhs, func) + eq = eq.lhs + + f = func.func + x = func.args[0] + y = func.args[1] + fx = f(x,y).diff(x) + fy = f(x,y).diff(y) + + # TODO : For now pde.py uses support offered by the ode_order function + # to find the order with respect to a multi-variable function. An + # improvement could be to classify the order of the PDE on the basis of + # individual variables. + order = ode_order(eq, f(x,y)) + + # hint:matchdict or hint:(tuple of matchdicts) + # Also will contain "default": and "order":order items. + matching_hints = {'order': order} + + if not order: + if dict: + matching_hints["default"] = None + return matching_hints + return () + + eq = expand(eq) + + a = Wild('a', exclude = [f(x,y)]) + b = Wild('b', exclude = [f(x,y), fx, fy, x, y]) + c = Wild('c', exclude = [f(x,y), fx, fy, x, y]) + d = Wild('d', exclude = [f(x,y), fx, fy, x, y]) + e = Wild('e', exclude = [f(x,y), fx, fy]) + n = Wild('n', exclude = [x, y]) + # Try removing the smallest power of f(x,y) + # from the highest partial derivatives of f(x,y) + reduced_eq = eq + if eq.is_Add: + power = None + for i in set(combinations_with_replacement((x,y), order)): + coeff = eq.coeff(f(x,y).diff(*i)) + if coeff == 1: + continue + match = coeff.match(a*f(x,y)**n) + if match and match[a]: + if power is None or match[n] < power: + power = match[n] + if power: + den = f(x,y)**power + reduced_eq = Add(*[arg/den for arg in eq.args]) + + if order == 1: + reduced_eq = collect(reduced_eq, f(x, y)) + r = reduced_eq.match(b*fx + c*fy + d*f(x,y) + e) + if r: + if not r[e]: + ## Linear first-order homogeneous partial-differential + ## equation with constant coefficients + r.update({'b': b, 'c': c, 'd': d}) + matching_hints["1st_linear_constant_coeff_homogeneous"] = r + elif r[b]**2 + r[c]**2 != 0: + ## Linear first-order general partial-differential + ## equation with constant coefficients + r.update({'b': b, 'c': c, 'd': d, 'e': e}) + matching_hints["1st_linear_constant_coeff"] = r + matching_hints["1st_linear_constant_coeff_Integral"] = r + + else: + b = Wild('b', exclude=[f(x, y), fx, fy]) + c = Wild('c', exclude=[f(x, y), fx, fy]) + d = Wild('d', exclude=[f(x, y), fx, fy]) + r = reduced_eq.match(b*fx + c*fy + d*f(x,y) + e) + if r: + r.update({'b': b, 'c': c, 'd': d, 'e': e}) + matching_hints["1st_linear_variable_coeff"] = r + + # Order keys based on allhints. + rettuple = tuple(i for i in allhints if i in matching_hints) + + if dict: + # Dictionaries are ordered arbitrarily, so make note of which + # hint would come first for pdsolve(). Use an ordered dict in Py 3. + matching_hints["default"] = None + matching_hints["ordered_hints"] = rettuple + for i in allhints: + if i in matching_hints: + matching_hints["default"] = i + break + return matching_hints + return rettuple + + +def checkpdesol(pde, sol, func=None, solve_for_func=True): + """ + Checks if the given solution satisfies the partial differential + equation. + + pde is the partial differential equation which can be given in the + form of an equation or an expression. sol is the solution for which + the pde is to be checked. This can also be given in an equation or + an expression form. If the function is not provided, the helper + function _preprocess from deutils is used to identify the function. + + If a sequence of solutions is passed, the same sort of container will be + used to return the result for each solution. + + The following methods are currently being implemented to check if the + solution satisfies the PDE: + + 1. Directly substitute the solution in the PDE and check. If the + solution has not been solved for f, then it will solve for f + provided solve_for_func has not been set to False. + + If the solution satisfies the PDE, then a tuple (True, 0) is returned. + Otherwise a tuple (False, expr) where expr is the value obtained + after substituting the solution in the PDE. However if a known solution + returns False, it may be due to the inability of doit() to simplify it to zero. + + Examples + ======== + + >>> from sympy import Function, symbols + >>> from sympy.solvers.pde import checkpdesol, pdsolve + >>> x, y = symbols('x y') + >>> f = Function('f') + >>> eq = 2*f(x,y) + 3*f(x,y).diff(x) + 4*f(x,y).diff(y) + >>> sol = pdsolve(eq) + >>> assert checkpdesol(eq, sol)[0] + >>> eq = x*f(x,y) + f(x,y).diff(x) + >>> checkpdesol(eq, sol) + (False, (x*F(4*x - 3*y) - 6*F(4*x - 3*y)/25 + 4*Subs(Derivative(F(_xi_1), _xi_1), _xi_1, 4*x - 3*y))*exp(-6*x/25 - 8*y/25)) + """ + + # Converting the pde into an equation + if not isinstance(pde, Equality): + pde = Eq(pde, 0) + + # If no function is given, try finding the function present. + if func is None: + try: + _, func = _preprocess(pde.lhs) + except ValueError: + funcs = [s.atoms(AppliedUndef) for s in ( + sol if is_sequence(sol, set) else [sol])] + funcs = set().union(funcs) + if len(funcs) != 1: + raise ValueError( + 'must pass func arg to checkpdesol for this case.') + func = funcs.pop() + + # If the given solution is in the form of a list or a set + # then return a list or set of tuples. + if is_sequence(sol, set): + return type(sol)([checkpdesol( + pde, i, func=func, + solve_for_func=solve_for_func) for i in sol]) + + # Convert solution into an equation + if not isinstance(sol, Equality): + sol = Eq(func, sol) + elif sol.rhs == func: + sol = sol.reversed + + # Try solving for the function + solved = sol.lhs == func and not sol.rhs.has(func) + if solve_for_func and not solved: + solved = solve(sol, func) + if solved: + if len(solved) == 1: + return checkpdesol(pde, Eq(func, solved[0]), + func=func, solve_for_func=False) + else: + return checkpdesol(pde, [Eq(func, t) for t in solved], + func=func, solve_for_func=False) + + # try direct substitution of the solution into the PDE and simplify + if sol.lhs == func: + pde = pde.lhs - pde.rhs + s = simplify(pde.subs(func, sol.rhs).doit()) + return s is S.Zero, s + + raise NotImplementedError(filldedent(''' + Unable to test if %s is a solution to %s.''' % (sol, pde))) + + + +def pde_1st_linear_constant_coeff_homogeneous(eq, func, order, match, solvefun): + r""" + Solves a first order linear homogeneous + partial differential equation with constant coefficients. + + The general form of this partial differential equation is + + .. math:: a \frac{\partial f(x,y)}{\partial x} + + b \frac{\partial f(x,y)}{\partial y} + c f(x,y) = 0 + + where `a`, `b` and `c` are constants. + + The general solution is of the form: + + .. math:: + f(x, y) = F(- a y + b x ) e^{- \frac{c (a x + b y)}{a^2 + b^2}} + + and can be found in SymPy with ``pdsolve``:: + + >>> from sympy.solvers import pdsolve + >>> from sympy.abc import x, y, a, b, c + >>> from sympy import Function, pprint + >>> f = Function('f') + >>> u = f(x,y) + >>> ux = u.diff(x) + >>> uy = u.diff(y) + >>> genform = a*ux + b*uy + c*u + >>> pprint(genform) + d d + a*--(f(x, y)) + b*--(f(x, y)) + c*f(x, y) + dx dy + + >>> pprint(pdsolve(genform)) + -c*(a*x + b*y) + --------------- + 2 2 + a + b + f(x, y) = F(-a*y + b*x)*e + + Examples + ======== + + >>> from sympy import pdsolve + >>> from sympy import Function, pprint + >>> from sympy.abc import x,y + >>> f = Function('f') + >>> pdsolve(f(x,y) + f(x,y).diff(x) + f(x,y).diff(y)) + Eq(f(x, y), F(x - y)*exp(-x/2 - y/2)) + >>> pprint(pdsolve(f(x,y) + f(x,y).diff(x) + f(x,y).diff(y))) + x y + - - - - + 2 2 + f(x, y) = F(x - y)*e + + References + ========== + + - Viktor Grigoryan, "Partial Differential Equations" + Math 124A - Fall 2010, pp.7 + + """ + # TODO : For now homogeneous first order linear PDE's having + # two variables are implemented. Once there is support for + # solving systems of ODE's, this can be extended to n variables. + + f = func.func + x = func.args[0] + y = func.args[1] + b = match[match['b']] + c = match[match['c']] + d = match[match['d']] + return Eq(f(x,y), exp(-S(d)/(b**2 + c**2)*(b*x + c*y))*solvefun(c*x - b*y)) + + +def pde_1st_linear_constant_coeff(eq, func, order, match, solvefun): + r""" + Solves a first order linear partial differential equation + with constant coefficients. + + The general form of this partial differential equation is + + .. math:: a \frac{\partial f(x,y)}{\partial x} + + b \frac{\partial f(x,y)}{\partial y} + + c f(x,y) = G(x,y) + + where `a`, `b` and `c` are constants and `G(x, y)` can be an arbitrary + function in `x` and `y`. + + The general solution of the PDE is: + + .. math:: + f(x, y) = \left. \left[F(\eta) + \frac{1}{a^2 + b^2} + \int\limits^{a x + b y} G\left(\frac{a \xi + b \eta}{a^2 + b^2}, + \frac{- a \eta + b \xi}{a^2 + b^2} \right) + e^{\frac{c \xi}{a^2 + b^2}}\, d\xi\right] + e^{- \frac{c \xi}{a^2 + b^2}} + \right|_{\substack{\eta=- a y + b x\\ \xi=a x + b y }}\, , + + where `F(\eta)` is an arbitrary single-valued function. The solution + can be found in SymPy with ``pdsolve``:: + + >>> from sympy.solvers import pdsolve + >>> from sympy.abc import x, y, a, b, c + >>> from sympy import Function, pprint + >>> f = Function('f') + >>> G = Function('G') + >>> u = f(x, y) + >>> ux = u.diff(x) + >>> uy = u.diff(y) + >>> genform = a*ux + b*uy + c*u - G(x,y) + >>> pprint(genform) + d d + a*--(f(x, y)) + b*--(f(x, y)) + c*f(x, y) - G(x, y) + dx dy + >>> pprint(pdsolve(genform, hint='1st_linear_constant_coeff_Integral')) + // a*x + b*y \ \| + || / | || + || | | || + || | c*xi | || + || | ------- | || + || | 2 2 | || + || | /a*xi + b*eta -a*eta + b*xi\ a + b | || + || | G|------------, -------------|*e d(xi)| || + || | | 2 2 2 2 | | || + || | \ a + b a + b / | -c*xi || + || | | -------|| + || / | 2 2|| + || | a + b || + f(x, y) = ||F(eta) + -------------------------------------------------------|*e || + || 2 2 | || + \\ a + b / /|eta=-a*y + b*x, xi=a*x + b*y + + Examples + ======== + + >>> from sympy.solvers.pde import pdsolve + >>> from sympy import Function, pprint, exp + >>> from sympy.abc import x,y + >>> f = Function('f') + >>> eq = -2*f(x,y).diff(x) + 4*f(x,y).diff(y) + 5*f(x,y) - exp(x + 3*y) + >>> pdsolve(eq) + Eq(f(x, y), (F(4*x + 2*y)*exp(x/2) + exp(x + 4*y)/15)*exp(-y)) + + References + ========== + + - Viktor Grigoryan, "Partial Differential Equations" + Math 124A - Fall 2010, pp.7 + + """ + + # TODO : For now homogeneous first order linear PDE's having + # two variables are implemented. Once there is support for + # solving systems of ODE's, this can be extended to n variables. + xi, eta = symbols("xi eta") + f = func.func + x = func.args[0] + y = func.args[1] + b = match[match['b']] + c = match[match['c']] + d = match[match['d']] + e = -match[match['e']] + expterm = exp(-S(d)/(b**2 + c**2)*xi) + functerm = solvefun(eta) + solvedict = solve((b*x + c*y - xi, c*x - b*y - eta), x, y) + # Integral should remain as it is in terms of xi, + # doit() should be done in _handle_Integral. + genterm = (1/S(b**2 + c**2))*Integral( + (1/expterm*e).subs(solvedict), (xi, b*x + c*y)) + return Eq(f(x,y), Subs(expterm*(functerm + genterm), + (eta, xi), (c*x - b*y, b*x + c*y))) + + +def pde_1st_linear_variable_coeff(eq, func, order, match, solvefun): + r""" + Solves a first order linear partial differential equation + with variable coefficients. The general form of this partial + differential equation is + + .. math:: a(x, y) \frac{\partial f(x, y)}{\partial x} + + b(x, y) \frac{\partial f(x, y)}{\partial y} + + c(x, y) f(x, y) = G(x, y) + + where `a(x, y)`, `b(x, y)`, `c(x, y)` and `G(x, y)` are arbitrary + functions in `x` and `y`. This PDE is converted into an ODE by + making the following transformation: + + 1. `\xi` as `x` + + 2. `\eta` as the constant in the solution to the differential + equation `\frac{dy}{dx} = -\frac{b}{a}` + + Making the previous substitutions reduces it to the linear ODE + + .. math:: a(\xi, \eta)\frac{du}{d\xi} + c(\xi, \eta)u - G(\xi, \eta) = 0 + + which can be solved using ``dsolve``. + + >>> from sympy.abc import x, y + >>> from sympy import Function, pprint + >>> a, b, c, G, f= [Function(i) for i in ['a', 'b', 'c', 'G', 'f']] + >>> u = f(x,y) + >>> ux = u.diff(x) + >>> uy = u.diff(y) + >>> genform = a(x, y)*u + b(x, y)*ux + c(x, y)*uy - G(x,y) + >>> pprint(genform) + d d + -G(x, y) + a(x, y)*f(x, y) + b(x, y)*--(f(x, y)) + c(x, y)*--(f(x, y)) + dx dy + + + Examples + ======== + + >>> from sympy.solvers.pde import pdsolve + >>> from sympy import Function, pprint + >>> from sympy.abc import x,y + >>> f = Function('f') + >>> eq = x*(u.diff(x)) - y*(u.diff(y)) + y**2*u - y**2 + >>> pdsolve(eq) + Eq(f(x, y), F(x*y)*exp(y**2/2) + 1) + + References + ========== + + - Viktor Grigoryan, "Partial Differential Equations" + Math 124A - Fall 2010, pp.7 + + """ + from sympy.solvers.ode import dsolve + + eta = symbols("eta") + f = func.func + x = func.args[0] + y = func.args[1] + b = match[match['b']] + c = match[match['c']] + d = match[match['d']] + e = -match[match['e']] + + + if not d: + # To deal with cases like b*ux = e or c*uy = e + if not (b and c): + if c: + try: + tsol = integrate(e/c, y) + except NotImplementedError: + raise NotImplementedError("Unable to find a solution" + " due to inability of integrate") + else: + return Eq(f(x,y), solvefun(x) + tsol) + if b: + try: + tsol = integrate(e/b, x) + except NotImplementedError: + raise NotImplementedError("Unable to find a solution" + " due to inability of integrate") + else: + return Eq(f(x,y), solvefun(y) + tsol) + + if not c: + # To deal with cases when c is 0, a simpler method is used. + # The PDE reduces to b*(u.diff(x)) + d*u = e, which is a linear ODE in x + plode = f(x).diff(x)*b + d*f(x) - e + sol = dsolve(plode, f(x)) + syms = sol.free_symbols - plode.free_symbols - {x, y} + rhs = _simplify_variable_coeff(sol.rhs, syms, solvefun, y) + return Eq(f(x, y), rhs) + + if not b: + # To deal with cases when b is 0, a simpler method is used. + # The PDE reduces to c*(u.diff(y)) + d*u = e, which is a linear ODE in y + plode = f(y).diff(y)*c + d*f(y) - e + sol = dsolve(plode, f(y)) + syms = sol.free_symbols - plode.free_symbols - {x, y} + rhs = _simplify_variable_coeff(sol.rhs, syms, solvefun, x) + return Eq(f(x, y), rhs) + + dummy = Function('d') + h = (c/b).subs(y, dummy(x)) + sol = dsolve(dummy(x).diff(x) - h, dummy(x)) + if isinstance(sol, list): + sol = sol[0] + solsym = sol.free_symbols - h.free_symbols - {x, y} + if len(solsym) == 1: + solsym = solsym.pop() + etat = (solve(sol, solsym)[0]).subs(dummy(x), y) + ysub = solve(eta - etat, y)[0] + deq = (b*(f(x).diff(x)) + d*f(x) - e).subs(y, ysub) + final = (dsolve(deq, f(x), hint='1st_linear')).rhs + if isinstance(final, list): + final = final[0] + finsyms = final.free_symbols - deq.free_symbols - {x, y} + rhs = _simplify_variable_coeff(final, finsyms, solvefun, etat) + return Eq(f(x, y), rhs) + + else: + raise NotImplementedError("Cannot solve the partial differential equation due" + " to inability of constantsimp") + + +def _simplify_variable_coeff(sol, syms, func, funcarg): + r""" + Helper function to replace constants by functions in 1st_linear_variable_coeff + """ + eta = Symbol("eta") + if len(syms) == 1: + sym = syms.pop() + final = sol.subs(sym, func(funcarg)) + + else: + for sym in syms: + final = sol.subs(sym, func(funcarg)) + + return simplify(final.subs(eta, funcarg)) + + +def pde_separate(eq, fun, sep, strategy='mul'): + """Separate variables in partial differential equation either by additive + or multiplicative separation approach. It tries to rewrite an equation so + that one of the specified variables occurs on a different side of the + equation than the others. + + :param eq: Partial differential equation + + :param fun: Original function F(x, y, z) + + :param sep: List of separated functions [X(x), u(y, z)] + + :param strategy: Separation strategy. You can choose between additive + separation ('add') and multiplicative separation ('mul') which is + default. + + Examples + ======== + + >>> from sympy import E, Eq, Function, pde_separate, Derivative as D + >>> from sympy.abc import x, t + >>> u, X, T = map(Function, 'uXT') + + >>> eq = Eq(D(u(x, t), x), E**(u(x, t))*D(u(x, t), t)) + >>> pde_separate(eq, u(x, t), [X(x), T(t)], strategy='add') + [exp(-X(x))*Derivative(X(x), x), exp(T(t))*Derivative(T(t), t)] + + >>> eq = Eq(D(u(x, t), x, 2), D(u(x, t), t, 2)) + >>> pde_separate(eq, u(x, t), [X(x), T(t)], strategy='mul') + [Derivative(X(x), (x, 2))/X(x), Derivative(T(t), (t, 2))/T(t)] + + See Also + ======== + pde_separate_add, pde_separate_mul + """ + + do_add = False + if strategy == 'add': + do_add = True + elif strategy == 'mul': + do_add = False + else: + raise ValueError('Unknown strategy: %s' % strategy) + + if isinstance(eq, Equality): + if eq.rhs != 0: + return pde_separate(Eq(eq.lhs - eq.rhs, 0), fun, sep, strategy) + else: + return pde_separate(Eq(eq, 0), fun, sep, strategy) + + if eq.rhs != 0: + raise ValueError("Value should be 0") + + # Handle arguments + orig_args = list(fun.args) + subs_args = [arg for s in sep for arg in s.args] + + if do_add: + functions = reduce(operator.add, sep) + else: + functions = reduce(operator.mul, sep) + + # Check whether variables match + if len(subs_args) != len(orig_args): + raise ValueError("Variable counts do not match") + # Check for duplicate arguments like [X(x), u(x, y)] + if has_dups(subs_args): + raise ValueError("Duplicate substitution arguments detected") + # Check whether the variables match + if set(orig_args) != set(subs_args): + raise ValueError("Arguments do not match") + + # Substitute original function with separated... + result = eq.lhs.subs(fun, functions).doit() + + # Divide by terms when doing multiplicative separation + if not do_add: + eq = 0 + for i in result.args: + eq += i/functions + result = eq + + svar = subs_args[0] + dvar = subs_args[1:] + return _separate(result, svar, dvar) + + +def pde_separate_add(eq, fun, sep): + """ + Helper function for searching additive separable solutions. + + Consider an equation of two independent variables x, y and a dependent + variable w, we look for the product of two functions depending on different + arguments: + + `w(x, y, z) = X(x) + y(y, z)` + + Examples + ======== + + >>> from sympy import E, Eq, Function, pde_separate_add, Derivative as D + >>> from sympy.abc import x, t + >>> u, X, T = map(Function, 'uXT') + + >>> eq = Eq(D(u(x, t), x), E**(u(x, t))*D(u(x, t), t)) + >>> pde_separate_add(eq, u(x, t), [X(x), T(t)]) + [exp(-X(x))*Derivative(X(x), x), exp(T(t))*Derivative(T(t), t)] + + """ + return pde_separate(eq, fun, sep, strategy='add') + + +def pde_separate_mul(eq, fun, sep): + """ + Helper function for searching multiplicative separable solutions. + + Consider an equation of two independent variables x, y and a dependent + variable w, we look for the product of two functions depending on different + arguments: + + `w(x, y, z) = X(x)*u(y, z)` + + Examples + ======== + + >>> from sympy import Function, Eq, pde_separate_mul, Derivative as D + >>> from sympy.abc import x, y + >>> u, X, Y = map(Function, 'uXY') + + >>> eq = Eq(D(u(x, y), x, 2), D(u(x, y), y, 2)) + >>> pde_separate_mul(eq, u(x, y), [X(x), Y(y)]) + [Derivative(X(x), (x, 2))/X(x), Derivative(Y(y), (y, 2))/Y(y)] + + """ + return pde_separate(eq, fun, sep, strategy='mul') + + +def _separate(eq, dep, others): + """Separate expression into two parts based on dependencies of variables.""" + + # FIRST PASS + # Extract derivatives depending our separable variable... + terms = set() + for term in eq.args: + if term.is_Mul: + for i in term.args: + if i.is_Derivative and not i.has(*others): + terms.add(term) + continue + elif term.is_Derivative and not term.has(*others): + terms.add(term) + # Find the factor that we need to divide by + div = set() + for term in terms: + ext, sep = term.expand().as_independent(dep) + # Failed? + if sep.has(*others): + return None + div.add(ext) + # FIXME: Find lcm() of all the divisors and divide with it, instead of + # current hack :( + # https://github.com/sympy/sympy/issues/4597 + if len(div) > 0: + # double sum required or some tests will fail + eq = Add(*[simplify(Add(*[term/i for i in div])) for term in eq.args]) + # SECOND PASS - separate the derivatives + div = set() + lhs = rhs = 0 + for term in eq.args: + # Check, whether we have already term with independent variable... + if not term.has(*others): + lhs += term + continue + # ...otherwise, try to separate + temp, sep = term.expand().as_independent(dep) + # Failed? + if sep.has(*others): + return None + # Extract the divisors + div.add(sep) + rhs -= term.expand() + # Do the division + fulldiv = reduce(operator.add, div) + lhs = simplify(lhs/fulldiv).expand() + rhs = simplify(rhs/fulldiv).expand() + # ...and check whether we were successful :) + if lhs.has(*others) or rhs.has(dep): + return None + return [lhs, rhs] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/polysys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/polysys.py new file mode 100644 index 0000000000000000000000000000000000000000..2edc70b36c25b986c975c33fcc57535ef0b31df2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/polysys.py @@ -0,0 +1,872 @@ +"""Solvers of systems of polynomial equations. """ + +from __future__ import annotations + +from typing import Any +from collections.abc import Sequence, Iterable + +import itertools + +from sympy import Dummy +from sympy.core import S +from sympy.core.expr import Expr +from sympy.core.exprtools import factor_terms +from sympy.core.sorting import default_sort_key +from sympy.logic.boolalg import Boolean +from sympy.polys import Poly, groebner, roots +from sympy.polys.domains import ZZ +from sympy.polys.polyoptions import build_options +from sympy.polys.polytools import parallel_poly_from_expr, sqf_part +from sympy.polys.polyerrors import ( + ComputationFailed, + PolificationFailed, + CoercionFailed, + GeneratorsNeeded, + DomainError +) +from sympy.simplify import rcollect +from sympy.utilities import postfixes +from sympy.utilities.iterables import cartes +from sympy.utilities.misc import filldedent +from sympy.logic.boolalg import Or, And +from sympy.core.relational import Eq + + +class SolveFailed(Exception): + """Raised when solver's conditions were not met. """ + + +def solve_poly_system(seq, *gens, strict=False, **args): + """ + Return a list of solutions for the system of polynomial equations + or else None. + + Parameters + ========== + + seq: a list/tuple/set + Listing all the equations that are needed to be solved + gens: generators + generators of the equations in seq for which we want the + solutions + strict: a boolean (default is False) + if strict is True, NotImplementedError will be raised if + the solution is known to be incomplete (which can occur if + not all solutions are expressible in radicals) + args: Keyword arguments + Special options for solving the equations. + + + Returns + ======= + + List[Tuple] + a list of tuples with elements being solutions for the + symbols in the order they were passed as gens + None + None is returned when the computed basis contains only the ground. + + Examples + ======== + + >>> from sympy import solve_poly_system + >>> from sympy.abc import x, y + + >>> solve_poly_system([x*y - 2*y, 2*y**2 - x**2], x, y) + [(0, 0), (2, -sqrt(2)), (2, sqrt(2))] + + >>> solve_poly_system([x**5 - x + y**3, y**2 - 1], x, y, strict=True) + Traceback (most recent call last): + ... + UnsolvableFactorError + + """ + try: + polys, opt = parallel_poly_from_expr(seq, *gens, **args) + except PolificationFailed as exc: + raise ComputationFailed('solve_poly_system', len(seq), exc) + + if len(polys) == len(opt.gens) == 2: + f, g = polys + + if all(i <= 2 for i in f.degree_list() + g.degree_list()): + try: + return solve_biquadratic(f, g, opt) + except SolveFailed: + pass + + return solve_generic(polys, opt, strict=strict) + + +def solve_biquadratic(f, g, opt): + """Solve a system of two bivariate quadratic polynomial equations. + + Parameters + ========== + + f: a single Expr or Poly + First equation + g: a single Expr or Poly + Second Equation + opt: an Options object + For specifying keyword arguments and generators + + Returns + ======= + + List[Tuple] + a list of tuples with elements being solutions for the + symbols in the order they were passed as gens + None + None is returned when the computed basis contains only the ground. + + Examples + ======== + + >>> from sympy import Options, Poly + >>> from sympy.abc import x, y + >>> from sympy.solvers.polysys import solve_biquadratic + >>> NewOption = Options((x, y), {'domain': 'ZZ'}) + + >>> a = Poly(y**2 - 4 + x, y, x, domain='ZZ') + >>> b = Poly(y*2 + 3*x - 7, y, x, domain='ZZ') + >>> solve_biquadratic(a, b, NewOption) + [(1/3, 3), (41/27, 11/9)] + + >>> a = Poly(y + x**2 - 3, y, x, domain='ZZ') + >>> b = Poly(-y + x - 4, y, x, domain='ZZ') + >>> solve_biquadratic(a, b, NewOption) + [(7/2 - sqrt(29)/2, -sqrt(29)/2 - 1/2), (sqrt(29)/2 + 7/2, -1/2 + \ + sqrt(29)/2)] + """ + G = groebner([f, g]) + + if len(G) == 1 and G[0].is_ground: + return None + + if len(G) != 2: + raise SolveFailed + + x, y = opt.gens + p, q = G + if not p.gcd(q).is_ground: + # not 0-dimensional + raise SolveFailed + + p = Poly(p, x, expand=False) + p_roots = [rcollect(expr, y) for expr in roots(p).keys()] + + q = q.ltrim(-1) + q_roots = list(roots(q).keys()) + + solutions = [(p_root.subs(y, q_root), q_root) for q_root, p_root in + itertools.product(q_roots, p_roots)] + + return sorted(solutions, key=default_sort_key) + + +def solve_generic(polys, opt, strict=False): + """ + Solve a generic system of polynomial equations. + + Returns all possible solutions over C[x_1, x_2, ..., x_m] of a + set F = { f_1, f_2, ..., f_n } of polynomial equations, using + Groebner basis approach. For now only zero-dimensional systems + are supported, which means F can have at most a finite number + of solutions. If the basis contains only the ground, None is + returned. + + The algorithm works by the fact that, supposing G is the basis + of F with respect to an elimination order (here lexicographic + order is used), G and F generate the same ideal, they have the + same set of solutions. By the elimination property, if G is a + reduced, zero-dimensional Groebner basis, then there exists an + univariate polynomial in G (in its last variable). This can be + solved by computing its roots. Substituting all computed roots + for the last (eliminated) variable in other elements of G, new + polynomial system is generated. Applying the above procedure + recursively, a finite number of solutions can be found. + + The ability of finding all solutions by this procedure depends + on the root finding algorithms. If no solutions were found, it + means only that roots() failed, but the system is solvable. To + overcome this difficulty use numerical algorithms instead. + + Parameters + ========== + + polys: a list/tuple/set + Listing all the polynomial equations that are needed to be solved + opt: an Options object + For specifying keyword arguments and generators + strict: a boolean + If strict is True, NotImplementedError will be raised if the solution + is known to be incomplete + + Returns + ======= + + List[Tuple] + a list of tuples with elements being solutions for the + symbols in the order they were passed as gens + None + None is returned when the computed basis contains only the ground. + + References + ========== + + .. [Buchberger01] B. Buchberger, Groebner Bases: A Short + Introduction for Systems Theorists, In: R. Moreno-Diaz, + B. Buchberger, J.L. Freire, Proceedings of EUROCAST'01, + February, 2001 + + .. [Cox97] D. Cox, J. Little, D. O'Shea, Ideals, Varieties + and Algorithms, Springer, Second Edition, 1997, pp. 112 + + Raises + ======== + + NotImplementedError + If the system is not zero-dimensional (does not have a finite + number of solutions) + + UnsolvableFactorError + If ``strict`` is True and not all solution components are + expressible in radicals + + Examples + ======== + + >>> from sympy import Poly, Options + >>> from sympy.solvers.polysys import solve_generic + >>> from sympy.abc import x, y + >>> NewOption = Options((x, y), {'domain': 'ZZ'}) + + >>> a = Poly(x - y + 5, x, y, domain='ZZ') + >>> b = Poly(x + y - 3, x, y, domain='ZZ') + >>> solve_generic([a, b], NewOption) + [(-1, 4)] + + >>> a = Poly(x - 2*y + 5, x, y, domain='ZZ') + >>> b = Poly(2*x - y - 3, x, y, domain='ZZ') + >>> solve_generic([a, b], NewOption) + [(11/3, 13/3)] + + >>> a = Poly(x**2 + y, x, y, domain='ZZ') + >>> b = Poly(x + y*4, x, y, domain='ZZ') + >>> solve_generic([a, b], NewOption) + [(0, 0), (1/4, -1/16)] + + >>> a = Poly(x**5 - x + y**3, x, y, domain='ZZ') + >>> b = Poly(y**2 - 1, x, y, domain='ZZ') + >>> solve_generic([a, b], NewOption, strict=True) + Traceback (most recent call last): + ... + UnsolvableFactorError + + """ + def _is_univariate(f): + """Returns True if 'f' is univariate in its last variable. """ + for monom in f.monoms(): + if any(monom[:-1]): + return False + + return True + + def _subs_root(f, gen, zero): + """Replace generator with a root so that the result is nice. """ + p = f.as_expr({gen: zero}) + + if f.degree(gen) >= 2: + p = p.expand(deep=False) + + return p + + def _solve_reduced_system(system, gens, entry=False): + """Recursively solves reduced polynomial systems. """ + if len(system) == len(gens) == 1: + # the below line will produce UnsolvableFactorError if + # strict=True and the solution from `roots` is incomplete + zeros = list(roots(system[0], gens[-1], strict=strict).keys()) + return [(zero,) for zero in zeros] + + basis = groebner(system, gens, polys=True) + + if len(basis) == 1 and basis[0].is_ground: + if not entry: + return [] + else: + return None + + univariate = list(filter(_is_univariate, basis)) + + if len(basis) < len(gens): + raise NotImplementedError(filldedent(''' + only zero-dimensional systems supported + (finite number of solutions) + ''')) + + if len(univariate) == 1: + f = univariate.pop() + else: + raise NotImplementedError(filldedent(''' + only zero-dimensional systems supported + (finite number of solutions) + ''')) + + gens = f.gens + gen = gens[-1] + + # the below line will produce UnsolvableFactorError if + # strict=True and the solution from `roots` is incomplete + zeros = list(roots(f.ltrim(gen), strict=strict).keys()) + + if not zeros: + return [] + + if len(basis) == 1: + return [(zero,) for zero in zeros] + + solutions = [] + + for zero in zeros: + new_system = [] + new_gens = gens[:-1] + + for b in basis[:-1]: + eq = _subs_root(b, gen, zero) + + if eq is not S.Zero: + new_system.append(eq) + + for solution in _solve_reduced_system(new_system, new_gens): + solutions.append(solution + (zero,)) + + if solutions and len(solutions[0]) != len(gens): + raise NotImplementedError(filldedent(''' + only zero-dimensional systems supported + (finite number of solutions) + ''')) + return solutions + + try: + result = _solve_reduced_system(polys, opt.gens, entry=True) + except CoercionFailed: + raise NotImplementedError + + if result is not None: + return sorted(result, key=default_sort_key) + + +def solve_triangulated(polys, *gens, **args): + """ + Solve a polynomial system using Gianni-Kalkbrenner algorithm. + + The algorithm proceeds by computing one Groebner basis in the ground + domain and then by iteratively computing polynomial factorizations in + appropriately constructed algebraic extensions of the ground domain. + + Parameters + ========== + + polys: a list/tuple/set + Listing all the equations that are needed to be solved + gens: generators + generators of the equations in polys for which we want the + solutions + args: Keyword arguments + Special options for solving the equations + + Returns + ======= + + List[Tuple] + A List of tuples. Solutions for symbols that satisfy the + equations listed in polys + + Examples + ======== + + >>> from sympy import solve_triangulated + >>> from sympy.abc import x, y, z + + >>> F = [x**2 + y + z - 1, x + y**2 + z - 1, x + y + z**2 - 1] + + >>> solve_triangulated(F, x, y, z) + [(0, 0, 1), (0, 1, 0), (1, 0, 0)] + + Using extension for algebraic solutions. + + >>> solve_triangulated(F, x, y, z, extension=True) #doctest: +NORMALIZE_WHITESPACE + [(0, 0, 1), (0, 1, 0), (1, 0, 0), + (CRootOf(x**2 + 2*x - 1, 0), CRootOf(x**2 + 2*x - 1, 0), CRootOf(x**2 + 2*x - 1, 0)), + (CRootOf(x**2 + 2*x - 1, 1), CRootOf(x**2 + 2*x - 1, 1), CRootOf(x**2 + 2*x - 1, 1))] + + References + ========== + + 1. Patrizia Gianni, Teo Mora, Algebraic Solution of System of + Polynomial Equations using Groebner Bases, AAECC-5 on Applied Algebra, + Algebraic Algorithms and Error-Correcting Codes, LNCS 356 247--257, 1989 + + """ + opt = build_options(gens, args) + + G = groebner(polys, gens, polys=True) + G = list(reversed(G)) + + extension = opt.get('extension', False) + if extension: + def _solve_univariate(f): + return [r for r, _ in f.all_roots(multiple=False, radicals=False)] + else: + domain = opt.get('domain') + + if domain is not None: + for i, g in enumerate(G): + G[i] = g.set_domain(domain) + + def _solve_univariate(f): + return list(f.ground_roots().keys()) + + f, G = G[0].ltrim(-1), G[1:] + dom = f.get_domain() + + zeros = _solve_univariate(f) + + if extension: + solutions = {((zero,), dom.algebraic_field(zero)) for zero in zeros} + else: + solutions = {((zero,), dom) for zero in zeros} + + var_seq = reversed(gens[:-1]) + vars_seq = postfixes(gens[1:]) + + for var, vars in zip(var_seq, vars_seq): + _solutions = set() + + for values, dom in solutions: + H, mapping = [], list(zip(vars, values)) + + for g in G: + _vars = (var,) + vars + + if g.has_only_gens(*_vars) and g.degree(var) != 0: + if extension: + g = g.set_domain(g.domain.unify(dom)) + h = g.ltrim(var).eval(dict(mapping)) + + if g.degree(var) == h.degree(): + H.append(h) + + p = min(H, key=lambda h: h.degree()) + zeros = _solve_univariate(p) + + for zero in zeros: + if not (zero in dom): + dom_zero = dom.algebraic_field(zero) + else: + dom_zero = dom + + _solutions.add(((zero,) + values, dom_zero)) + + solutions = _solutions + return sorted((s for s, _ in solutions), key=default_sort_key) + + +def factor_system(eqs: Sequence[Expr | complex], gens: Sequence[Expr] = (), **kwargs: Any) -> list[list[Expr]]: + """ + Factorizes a system of polynomial equations into + irreducible subsystems. + + Parameters + ========== + + eqs : list + List of expressions to be factored. + Each expression is assumed to be equal to zero. + + gens : list, optional + Generator(s) of the polynomial ring. + If not provided, all free symbols will be used. + + **kwargs : dict, optional + Same optional arguments taken by ``factor`` + + Returns + ======= + + list[list[Expr]] + A list of lists of expressions, where each sublist represents + an irreducible subsystem. When solved, each subsystem gives + one component of the solution. Only generic solutions are + returned (cases not requiring parameters to be zero). + + Examples + ======== + + >>> from sympy.solvers.polysys import factor_system, factor_system_cond + >>> from sympy.abc import x, y, a, b, c + + A simple system with multiple solutions: + + >>> factor_system([x**2 - 1, y - 1]) + [[x + 1, y - 1], [x - 1, y - 1]] + + A system with no solution: + + >>> factor_system([x, 1]) + [] + + A system where any value of the symbol(s) is a solution: + + >>> factor_system([x - x, (x + 1)**2 - (x**2 + 2*x + 1)]) + [[]] + + A system with no generic solution: + + >>> factor_system([a*x*(x-1), b*y, c], [x, y]) + [] + + If c is added to the unknowns then the system has a generic solution: + + >>> factor_system([a*x*(x-1), b*y, c], [x, y, c]) + [[x - 1, y, c], [x, y, c]] + + Alternatively :func:`factor_system_cond` can be used to get degenerate + cases as well: + + >>> factor_system_cond([a*x*(x-1), b*y, c], [x, y]) + [[x - 1, y, c], [x, y, c], [x - 1, b, c], [x, b, c], [y, a, c], [a, b, c]] + + Each of the above cases is only satisfiable in the degenerate case `c = 0`. + + The solution set of the original system represented + by eqs is the union of the solution sets of the + factorized systems. + + An empty list [] means no generic solution exists. + A list containing an empty list [[]] means any value of + the symbol(s) is a solution. + + See Also + ======== + + factor_system_cond : Returns both generic and degenerate solutions + factor_system_bool : Returns a Boolean combination representing all solutions + sympy.polys.polytools.factor : Factors a polynomial into irreducible factors + over the rational numbers + """ + + systems = _factor_system_poly_from_expr(eqs, gens, **kwargs) + systems_generic = [sys for sys in systems if not _is_degenerate(sys)] + systems_expr = [[p.as_expr() for p in system] for system in systems_generic] + return systems_expr + + +def _is_degenerate(system: list[Poly]) -> bool: + """Helper function to check if a system is degenerate""" + return any(p.is_ground for p in system) + + +def factor_system_bool(eqs: Sequence[Expr | complex], gens: Sequence[Expr] = (), **kwargs: Any) -> Boolean: + """ + Factorizes a system of polynomial equations into irreducible DNF. + + The system of expressions(eqs) is taken and a Boolean combination + of equations is returned that represents the same solution set. + The result is in disjunctive normal form (OR of ANDs). + + Parameters + ========== + + eqs : list + List of expressions to be factored. + Each expression is assumed to be equal to zero. + + gens : list, optional + Generator(s) of the polynomial ring. + If not provided, all free symbols will be used. + + **kwargs : dict, optional + Optional keyword arguments + + + Returns + ======= + + Boolean: + A Boolean combination of equations. The result is typically in + the form of a conjunction (AND) of a disjunctive normal form + with additional conditions. + + Examples + ======== + + >>> from sympy.solvers.polysys import factor_system_bool + >>> from sympy.abc import x, y, a, b, c + >>> factor_system_bool([x**2 - 1]) + Eq(x - 1, 0) | Eq(x + 1, 0) + + >>> factor_system_bool([x**2 - 1, y - 1]) + (Eq(x - 1, 0) & Eq(y - 1, 0)) | (Eq(x + 1, 0) & Eq(y - 1, 0)) + + >>> eqs = [a * (x - 1), b] + >>> factor_system_bool([a*(x - 1), b]) + (Eq(a, 0) & Eq(b, 0)) | (Eq(b, 0) & Eq(x - 1, 0)) + + >>> factor_system_bool([a*x**2 - a, b*(x + 1), c], [x]) + (Eq(c, 0) & Eq(x + 1, 0)) | (Eq(a, 0) & Eq(b, 0) & Eq(c, 0)) | (Eq(b, 0) & Eq(c, 0) & Eq(x - 1, 0)) + + >>> factor_system_bool([x**2 + 2*x + 1 - (x + 1)**2]) + True + + The result is logically equivalent to the system of equations + i.e. eqs. The function returns ``True`` when all values of + the symbol(s) is a solution and ``False`` when the system + cannot be solved. + + See Also + ======== + + factor_system : Returns factors and solvability condition separately + factor_system_cond : Returns both factors and conditions + + """ + + systems = factor_system_cond(eqs, gens, **kwargs) + return Or(*[And(*[Eq(eq, 0) for eq in sys]) for sys in systems]) + + +def factor_system_cond(eqs: Sequence[Expr | complex], gens: Sequence[Expr] = (), **kwargs: Any) -> list[list[Expr]]: + """ + Factorizes a polynomial system into irreducible components and returns + both generic and degenerate solutions. + + Parameters + ========== + + eqs : list + List of expressions to be factored. + Each expression is assumed to be equal to zero. + + gens : list, optional + Generator(s) of the polynomial ring. + If not provided, all free symbols will be used. + + **kwargs : dict, optional + Optional keyword arguments. + + Returns + ======= + + list[list[Expr]] + A list of lists of expressions, where each sublist represents + an irreducible subsystem. Includes both generic solutions and + degenerate cases requiring equality conditions on parameters. + + Examples + ======== + + >>> from sympy.solvers.polysys import factor_system_cond + >>> from sympy.abc import x, y, a, b, c + + >>> factor_system_cond([x**2 - 4, a*y, b], [x, y]) + [[x + 2, y, b], [x - 2, y, b], [x + 2, a, b], [x - 2, a, b]] + + >>> factor_system_cond([a*x*(x-1), b*y, c], [x, y]) + [[x - 1, y, c], [x, y, c], [x - 1, b, c], [x, b, c], [y, a, c], [a, b, c]] + + An empty list [] means no solution exists. + A list containing an empty list [[]] means any value of + the symbol(s) is a solution. + + See Also + ======== + + factor_system : Returns only generic solutions + factor_system_bool : Returns a Boolean combination representing all solutions + sympy.polys.polytools.factor : Factors a polynomial into irreducible factors + over the rational numbers + """ + systems_poly = _factor_system_poly_from_expr(eqs, gens, **kwargs) + systems = [[p.as_expr() for p in system] for system in systems_poly] + return systems + + +def _factor_system_poly_from_expr( + eqs: Sequence[Expr | complex], gens: Sequence[Expr], **kwargs: Any +) -> list[list[Poly]]: + """ + Convert expressions to polynomials and factor the system. + + Takes a sequence of expressions, converts them to + polynomials, and factors the resulting system. Handles both regular + polynomial systems and purely numerical cases. + """ + try: + polys, opts = parallel_poly_from_expr(eqs, *gens, **kwargs) + only_numbers = False + except (GeneratorsNeeded, PolificationFailed): + _u = Dummy('u') + polys, opts = parallel_poly_from_expr(eqs, [_u], **kwargs) + assert opts['domain'].is_Numerical + only_numbers = True + + if only_numbers: + return [[]] if all(p == 0 for p in polys) else [] + + return factor_system_poly(polys) + + +def factor_system_poly(polys: list[Poly]) -> list[list[Poly]]: + """ + Factors a system of polynomial equations into irreducible subsystems + + Core implementation that works directly with Poly instances. + + Parameters + ========== + + polys : list[Poly] + A list of Poly instances to be factored. + + Returns + ======= + + list[list[Poly]] + A list of lists of polynomials, where each sublist represents + an irreducible component of the solution. Includes both + generic and degenerate cases. + + Examples + ======== + + >>> from sympy import symbols, Poly, ZZ + >>> from sympy.solvers.polysys import factor_system_poly + >>> a, b, c, x = symbols('a b c x') + >>> p1 = Poly((a - 1)*(x - 2), x, domain=ZZ[a,b,c]) + >>> p2 = Poly((b - 3)*(x - 2), x, domain=ZZ[a,b,c]) + >>> p3 = Poly(c, x, domain=ZZ[a,b,c]) + + The equation to be solved for x is ``x - 2 = 0`` provided either + of the two conditions on the parameters ``a`` and ``b`` is nonzero + and the constant parameter ``c`` should be zero. + + >>> sys1, sys2 = factor_system_poly([p1, p2, p3]) + >>> sys1 + [Poly(x - 2, x, domain='ZZ[a,b,c]'), + Poly(c, x, domain='ZZ[a,b,c]')] + >>> sys2 + [Poly(a - 1, x, domain='ZZ[a,b,c]'), + Poly(b - 3, x, domain='ZZ[a,b,c]'), + Poly(c, x, domain='ZZ[a,b,c]')] + + An empty list [] when returned means no solution exists. + Whereas a list containing an empty list [[]] means any value is a solution. + + See Also + ======== + + factor_system : Returns only generic solutions + factor_system_bool : Returns a Boolean combination representing the solutions + factor_system_cond : Returns both generic and degenerate solutions + sympy.polys.polytools.factor : Factors a polynomial into irreducible factors + over the rational numbers + """ + if not all(isinstance(poly, Poly) for poly in polys): + raise TypeError("polys should be a list of Poly instances") + if not polys: + return [[]] + + base_domain = polys[0].domain + base_gens = polys[0].gens + if not all(poly.domain == base_domain and poly.gens == base_gens for poly in polys[1:]): + raise DomainError("All polynomials must have the same domain and generators") + + factor_sets = [] + for poly in polys: + constant, factors_mult = poly.factor_list() + + if constant.is_zero is True: + continue + elif constant.is_zero is False: + if not factors_mult: + return [] + factor_sets.append([f for f, _ in factors_mult]) + else: + constant = sqf_part(factor_terms(constant).as_coeff_Mul()[1]) + constp = Poly(constant, base_gens, domain=base_domain) + factors = [f for f, _ in factors_mult] + factors.append(constp) + factor_sets.append(factors) + + if not factor_sets: + return [[]] + + result = _factor_sets(factor_sets) + return _sort_systems(result) + + +def _factor_sets_slow(eqs: list[list]) -> set[frozenset]: + """ + Helper to find the minimal set of factorised subsystems that is + equivalent to the original system. + + The result is in DNF. + """ + if not eqs: + return {frozenset()} + systems_set = {frozenset(sys) for sys in cartes(*eqs)} + return {s1 for s1 in systems_set if not any(s1 > s2 for s2 in systems_set)} + + +def _factor_sets(eqs: list[list]) -> set[frozenset]: + """ + Helper that builds factor combinations. + """ + if not eqs: + return {frozenset()} + + current_set = min(eqs, key=len) + other_sets = [s for s in eqs if s is not current_set] + + stack = [(factor, [s for s in other_sets if factor not in s], {factor}) + for factor in current_set] + + result = set() + + while stack: + factor, remaining_sets, current_solution = stack.pop() + + if not remaining_sets: + result.add(frozenset(current_solution)) + continue + + next_set = min(remaining_sets, key=len) + next_remaining = [s for s in remaining_sets if s is not next_set] + + for next_factor in next_set: + valid_remaining = [s for s in next_remaining if next_factor not in s] + new_solution = current_solution | {next_factor} + stack.append((next_factor, valid_remaining, new_solution)) + + return {s1 for s1 in result if not any(s1 > s2 for s2 in result)} + + +def _sort_systems(systems: Iterable[Iterable[Poly]]) -> list[list[Poly]]: + """Sorts a list of lists of polynomials""" + systems_list = [sorted(s, key=_poly_sort_key, reverse=True) for s in systems] + return sorted(systems_list, key=_sys_sort_key, reverse=True) + + +def _poly_sort_key(poly): + """Sort key for polynomials""" + if poly.domain.is_FF: + poly = poly.set_domain(ZZ) + return poly.degree_list(), poly.rep.to_list() + + +def _sys_sort_key(sys): + """Sort key for lists of polynomials""" + return list(zip(*map(_poly_sort_key, sys))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/recurr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/recurr.py new file mode 100644 index 0000000000000000000000000000000000000000..ba627bbd4cb0844f11a8743634f5f10328aadca8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/recurr.py @@ -0,0 +1,843 @@ +r""" +This module is intended for solving recurrences or, in other words, +difference equations. Currently supported are linear, inhomogeneous +equations with polynomial or rational coefficients. + +The solutions are obtained among polynomials, rational functions, +hypergeometric terms, or combinations of hypergeometric term which +are pairwise dissimilar. + +``rsolve_X`` functions were meant as a low level interface +for ``rsolve`` which would use Mathematica's syntax. + +Given a recurrence relation: + + .. math:: a_{k}(n) y(n+k) + a_{k-1}(n) y(n+k-1) + + ... + a_{0}(n) y(n) = f(n) + +where `k > 0` and `a_{i}(n)` are polynomials in `n`. To use +``rsolve_X`` we need to put all coefficients in to a list ``L`` of +`k+1` elements the following way: + + ``L = [a_{0}(n), ..., a_{k-1}(n), a_{k}(n)]`` + +where ``L[i]``, for `i=0, \ldots, k`, maps to +`a_{i}(n) y(n+i)` (`y(n+i)` is implicit). + +For example if we would like to compute `m`-th Bernoulli polynomial +up to a constant (example was taken from rsolve_poly docstring), +then we would use `b(n+1) - b(n) = m n^{m-1}` recurrence, which +has solution `b(n) = B_m + C`. + +Then ``L = [-1, 1]`` and `f(n) = m n^(m-1)` and finally for `m=4`: + +>>> from sympy import Symbol, bernoulli, rsolve_poly +>>> n = Symbol('n', integer=True) + +>>> rsolve_poly([-1, 1], 4*n**3, n) +C0 + n**4 - 2*n**3 + n**2 + +>>> bernoulli(4, n) +n**4 - 2*n**3 + n**2 - 1/30 + +For the sake of completeness, `f(n)` can be: + + [1] a polynomial -> rsolve_poly + [2] a rational function -> rsolve_ratio + [3] a hypergeometric function -> rsolve_hyper +""" +from collections import defaultdict + +from sympy.concrete import product +from sympy.core.singleton import S +from sympy.core.numbers import Rational, I +from sympy.core.symbol import Symbol, Wild, Dummy +from sympy.core.relational import Equality +from sympy.core.add import Add +from sympy.core.mul import Mul +from sympy.core.sorting import default_sort_key +from sympy.core.sympify import sympify + +from sympy.simplify import simplify, hypersimp, hypersimilar # type: ignore +from sympy.solvers import solve, solve_undetermined_coeffs +from sympy.polys import Poly, quo, gcd, lcm, roots, resultant +from sympy.functions import binomial, factorial, FallingFactorial, RisingFactorial +from sympy.matrices import Matrix, casoratian +from sympy.utilities.iterables import numbered_symbols + + +def rsolve_poly(coeffs, f, n, shift=0, **hints): + r""" + Given linear recurrence operator `\operatorname{L}` of order + `k` with polynomial coefficients and inhomogeneous equation + `\operatorname{L} y = f`, where `f` is a polynomial, we seek for + all polynomial solutions over field `K` of characteristic zero. + + The algorithm performs two basic steps: + + (1) Compute degree `N` of the general polynomial solution. + (2) Find all polynomials of degree `N` or less + of `\operatorname{L} y = f`. + + There are two methods for computing the polynomial solutions. + If the degree bound is relatively small, i.e. it's smaller than + or equal to the order of the recurrence, then naive method of + undetermined coefficients is being used. This gives a system + of algebraic equations with `N+1` unknowns. + + In the other case, the algorithm performs transformation of the + initial equation to an equivalent one for which the system of + algebraic equations has only `r` indeterminates. This method is + quite sophisticated (in comparison with the naive one) and was + invented together by Abramov, Bronstein and Petkovsek. + + It is possible to generalize the algorithm implemented here to + the case of linear q-difference and differential equations. + + Lets say that we would like to compute `m`-th Bernoulli polynomial + up to a constant. For this we can use `b(n+1) - b(n) = m n^{m-1}` + recurrence, which has solution `b(n) = B_m + C`. For example: + + >>> from sympy import Symbol, rsolve_poly + >>> n = Symbol('n', integer=True) + + >>> rsolve_poly([-1, 1], 4*n**3, n) + C0 + n**4 - 2*n**3 + n**2 + + References + ========== + + .. [1] S. A. Abramov, M. Bronstein and M. Petkovsek, On polynomial + solutions of linear operator equations, in: T. Levelt, ed., + Proc. ISSAC '95, ACM Press, New York, 1995, 290-296. + + .. [2] M. Petkovsek, Hypergeometric solutions of linear recurrences + with polynomial coefficients, J. Symbolic Computation, + 14 (1992), 243-264. + + .. [3] M. Petkovsek, H. S. Wilf, D. Zeilberger, A = B, 1996. + + """ + f = sympify(f) + + if not f.is_polynomial(n): + return None + + homogeneous = f.is_zero + + r = len(coeffs) - 1 + + coeffs = [Poly(coeff, n) for coeff in coeffs] + + polys = [Poly(0, n)]*(r + 1) + terms = [(S.Zero, S.NegativeInfinity)]*(r + 1) + + for i in range(r + 1): + for j in range(i, r + 1): + polys[i] += coeffs[j]*(binomial(j, i).as_poly(n)) + + if not polys[i].is_zero: + (exp,), coeff = polys[i].LT() + terms[i] = (coeff, exp) + + d = b = terms[0][1] + + for i in range(1, r + 1): + if terms[i][1] > d: + d = terms[i][1] + + if terms[i][1] - i > b: + b = terms[i][1] - i + + d, b = int(d), int(b) + + x = Dummy('x') + + degree_poly = S.Zero + + for i in range(r + 1): + if terms[i][1] - i == b: + degree_poly += terms[i][0]*FallingFactorial(x, i) + + nni_roots = list(roots(degree_poly, x, filter='Z', + predicate=lambda r: r >= 0).keys()) + + if nni_roots: + N = [max(nni_roots)] + else: + N = [] + + if homogeneous: + N += [-b - 1] + else: + N += [f.as_poly(n).degree() - b, -b - 1] + + N = int(max(N)) + + if N < 0: + if homogeneous: + if hints.get('symbols', False): + return (S.Zero, []) + else: + return S.Zero + else: + return None + + if N <= r: + C = [] + y = E = S.Zero + + for i in range(N + 1): + C.append(Symbol('C' + str(i + shift))) + y += C[i] * n**i + + for i in range(r + 1): + E += coeffs[i].as_expr()*y.subs(n, n + i) + + solutions = solve_undetermined_coeffs(E - f, C, n) + + if solutions is not None: + _C = C + C = [c for c in C if (c not in solutions)] + result = y.subs(solutions) + else: + return None # TBD + else: + A = r + U = N + A + b + 1 + + nni_roots = list(roots(polys[r], filter='Z', + predicate=lambda r: r >= 0).keys()) + + if nni_roots != []: + a = max(nni_roots) + 1 + else: + a = S.Zero + + def _zero_vector(k): + return [S.Zero] * k + + def _one_vector(k): + return [S.One] * k + + def _delta(p, k): + B = S.One + D = p.subs(n, a + k) + + for i in range(1, k + 1): + B *= Rational(i - k - 1, i) + D += B * p.subs(n, a + k - i) + + return D + + alpha = {} + + for i in range(-A, d + 1): + I = _one_vector(d + 1) + + for k in range(1, d + 1): + I[k] = I[k - 1] * (x + i - k + 1)/k + + alpha[i] = S.Zero + + for j in range(A + 1): + for k in range(d + 1): + B = binomial(k, i + j) + D = _delta(polys[j].as_expr(), k) + + alpha[i] += I[k]*B*D + + V = Matrix(U, A, lambda i, j: int(i == j)) + + if homogeneous: + for i in range(A, U): + v = _zero_vector(A) + + for k in range(1, A + b + 1): + if i - k < 0: + break + + B = alpha[k - A].subs(x, i - k) + + for j in range(A): + v[j] += B * V[i - k, j] + + denom = alpha[-A].subs(x, i) + + for j in range(A): + V[i, j] = -v[j] / denom + else: + G = _zero_vector(U) + + for i in range(A, U): + v = _zero_vector(A) + g = S.Zero + + for k in range(1, A + b + 1): + if i - k < 0: + break + + B = alpha[k - A].subs(x, i - k) + + for j in range(A): + v[j] += B * V[i - k, j] + + g += B * G[i - k] + + denom = alpha[-A].subs(x, i) + + for j in range(A): + V[i, j] = -v[j] / denom + + G[i] = (_delta(f, i - A) - g) / denom + + P, Q = _one_vector(U), _zero_vector(A) + + for i in range(1, U): + P[i] = (P[i - 1] * (n - a - i + 1)/i).expand() + + for i in range(A): + Q[i] = Add(*[(v*p).expand() for v, p in zip(V[:, i], P)]) + + if not homogeneous: + h = Add(*[(g*p).expand() for g, p in zip(G, P)]) + + C = [Symbol('C' + str(i + shift)) for i in range(A)] + + g = lambda i: Add(*[c*_delta(q, i) for c, q in zip(C, Q)]) + + if homogeneous: + E = [g(i) for i in range(N + 1, U)] + else: + E = [g(i) + _delta(h, i) for i in range(N + 1, U)] + + if E != []: + solutions = solve(E, *C) + + if not solutions: + if homogeneous: + if hints.get('symbols', False): + return (S.Zero, []) + else: + return S.Zero + else: + return None + else: + solutions = {} + + if homogeneous: + result = S.Zero + else: + result = h + + _C = C[:] + for c, q in list(zip(C, Q)): + if c in solutions: + s = solutions[c]*q + C.remove(c) + else: + s = c*q + + result += s.expand() + + if C != _C: + # renumber so they are contiguous + result = result.xreplace(dict(zip(C, _C))) + C = _C[:len(C)] + + if hints.get('symbols', False): + return (result, C) + else: + return result + + +def rsolve_ratio(coeffs, f, n, **hints): + r""" + Given linear recurrence operator `\operatorname{L}` of order `k` + with polynomial coefficients and inhomogeneous equation + `\operatorname{L} y = f`, where `f` is a polynomial, we seek + for all rational solutions over field `K` of characteristic zero. + + This procedure accepts only polynomials, however if you are + interested in solving recurrence with rational coefficients + then use ``rsolve`` which will pre-process the given equation + and run this procedure with polynomial arguments. + + The algorithm performs two basic steps: + + (1) Compute polynomial `v(n)` which can be used as universal + denominator of any rational solution of equation + `\operatorname{L} y = f`. + + (2) Construct new linear difference equation by substitution + `y(n) = u(n)/v(n)` and solve it for `u(n)` finding all its + polynomial solutions. Return ``None`` if none were found. + + The algorithm implemented here is a revised version of the original + Abramov's algorithm, developed in 1989. The new approach is much + simpler to implement and has better overall efficiency. This + method can be easily adapted to the q-difference equations case. + + Besides finding rational solutions alone, this functions is + an important part of Hyper algorithm where it is used to find + a particular solution for the inhomogeneous part of a recurrence. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.solvers.recurr import rsolve_ratio + >>> rsolve_ratio([-2*x**3 + x**2 + 2*x - 1, 2*x**3 + x**2 - 6*x, + ... - 2*x**3 - 11*x**2 - 18*x - 9, 2*x**3 + 13*x**2 + 22*x + 8], 0, x) + C0*(2*x - 3)/(2*(x**2 - 1)) + + References + ========== + + .. [1] S. A. Abramov, Rational solutions of linear difference + and q-difference equations with polynomial coefficients, + in: T. Levelt, ed., Proc. ISSAC '95, ACM Press, New York, + 1995, 285-289 + + See Also + ======== + + rsolve_hyper + """ + f = sympify(f) + + if not f.is_polynomial(n): + return None + + coeffs = list(map(sympify, coeffs)) + + r = len(coeffs) - 1 + + A, B = coeffs[r], coeffs[0] + A = A.subs(n, n - r).expand() + + h = Dummy('h') + + res = resultant(A, B.subs(n, n + h), n) + + if not res.is_polynomial(h): + p, q = res.as_numer_denom() + res = quo(p, q, h) + + nni_roots = list(roots(res, h, filter='Z', + predicate=lambda r: r >= 0).keys()) + + if not nni_roots: + return rsolve_poly(coeffs, f, n, **hints) + else: + C, numers = S.One, [S.Zero]*(r + 1) + + for i in range(int(max(nni_roots)), -1, -1): + d = gcd(A, B.subs(n, n + i), n) + + A = quo(A, d, n) + B = quo(B, d.subs(n, n - i), n) + + C *= Mul(*[d.subs(n, n - j) for j in range(i + 1)]) + + denoms = [C.subs(n, n + i) for i in range(r + 1)] + + for i in range(r + 1): + g = gcd(coeffs[i], denoms[i], n) + + numers[i] = quo(coeffs[i], g, n) + denoms[i] = quo(denoms[i], g, n) + + for i in range(r + 1): + numers[i] *= Mul(*(denoms[:i] + denoms[i + 1:])) + + result = rsolve_poly(numers, f * Mul(*denoms), n, **hints) + + if result is not None: + if hints.get('symbols', False): + return (simplify(result[0] / C), result[1]) + else: + return simplify(result / C) + else: + return None + + +def rsolve_hyper(coeffs, f, n, **hints): + r""" + Given linear recurrence operator `\operatorname{L}` of order `k` + with polynomial coefficients and inhomogeneous equation + `\operatorname{L} y = f` we seek for all hypergeometric solutions + over field `K` of characteristic zero. + + The inhomogeneous part can be either hypergeometric or a sum + of a fixed number of pairwise dissimilar hypergeometric terms. + + The algorithm performs three basic steps: + + (1) Group together similar hypergeometric terms in the + inhomogeneous part of `\operatorname{L} y = f`, and find + particular solution using Abramov's algorithm. + + (2) Compute generating set of `\operatorname{L}` and find basis + in it, so that all solutions are linearly independent. + + (3) Form final solution with the number of arbitrary + constants equal to dimension of basis of `\operatorname{L}`. + + Term `a(n)` is hypergeometric if it is annihilated by first order + linear difference equations with polynomial coefficients or, in + simpler words, if consecutive term ratio is a rational function. + + The output of this procedure is a linear combination of fixed + number of hypergeometric terms. However the underlying method + can generate larger class of solutions - D'Alembertian terms. + + Note also that this method not only computes the kernel of the + inhomogeneous equation, but also reduces in to a basis so that + solutions generated by this procedure are linearly independent + + Examples + ======== + + >>> from sympy.solvers import rsolve_hyper + >>> from sympy.abc import x + + >>> rsolve_hyper([-1, -1, 1], 0, x) + C0*(1/2 - sqrt(5)/2)**x + C1*(1/2 + sqrt(5)/2)**x + + >>> rsolve_hyper([-1, 1], 1 + x, x) + C0 + x*(x + 1)/2 + + References + ========== + + .. [1] M. Petkovsek, Hypergeometric solutions of linear recurrences + with polynomial coefficients, J. Symbolic Computation, + 14 (1992), 243-264. + + .. [2] M. Petkovsek, H. S. Wilf, D. Zeilberger, A = B, 1996. + """ + coeffs = list(map(sympify, coeffs)) + + f = sympify(f) + + r, kernel, symbols = len(coeffs) - 1, [], set() + + if not f.is_zero: + if f.is_Add: + similar = {} + + for g in f.expand().args: + if not g.is_hypergeometric(n): + return None + + for h in similar.keys(): + if hypersimilar(g, h, n): + similar[h] += g + break + else: + similar[g] = S.Zero + + inhomogeneous = [g + h for g, h in similar.items()] + elif f.is_hypergeometric(n): + inhomogeneous = [f] + else: + return None + + for i, g in enumerate(inhomogeneous): + coeff, polys = S.One, coeffs[:] + denoms = [S.One]*(r + 1) + + s = hypersimp(g, n) + + for j in range(1, r + 1): + coeff *= s.subs(n, n + j - 1) + + p, q = coeff.as_numer_denom() + + polys[j] *= p + denoms[j] = q + + for j in range(r + 1): + polys[j] *= Mul(*(denoms[:j] + denoms[j + 1:])) + + # FIXME: The call to rsolve_ratio below should suffice (rsolve_poly + # call can be removed) but the XFAIL test_rsolve_ratio_missed must + # be fixed first. + R = rsolve_ratio(polys, Mul(*denoms), n, symbols=True) + if R is not None: + R, syms = R + if syms: + R = R.subs(zip(syms, [0]*len(syms))) + else: + R = rsolve_poly(polys, Mul(*denoms), n) + + if R: + inhomogeneous[i] *= R + else: + return None + + result = Add(*inhomogeneous) + result = simplify(result) + else: + result = S.Zero + + Z = Dummy('Z') + + p, q = coeffs[0], coeffs[r].subs(n, n - r + 1) + + p_factors = list(roots(p, n).keys()) + q_factors = list(roots(q, n).keys()) + + factors = [(S.One, S.One)] + + for p in p_factors: + for q in q_factors: + if p.is_integer and q.is_integer and p <= q: + continue + else: + factors += [(n - p, n - q)] + + p = [(n - p, S.One) for p in p_factors] + q = [(S.One, n - q) for q in q_factors] + + factors = p + factors + q + + for A, B in factors: + polys, degrees = [], [] + D = A*B.subs(n, n + r - 1) + + for i in range(r + 1): + a = Mul(*[A.subs(n, n + j) for j in range(i)]) + b = Mul(*[B.subs(n, n + j) for j in range(i, r)]) + + poly = quo(coeffs[i]*a*b, D, n) + polys.append(poly.as_poly(n)) + + if not poly.is_zero: + degrees.append(polys[i].degree()) + + if degrees: + d, poly = max(degrees), S.Zero + else: + return None + + for i in range(r + 1): + coeff = polys[i].nth(d) + + if coeff is not S.Zero: + poly += coeff * Z**i + + for z in roots(poly, Z).keys(): + if z.is_zero: + continue + + recurr_coeffs = [polys[i].as_expr()*z**i for i in range(r + 1)] + if d == 0 and 0 != Add(*[recurr_coeffs[j]*j for j in range(1, r + 1)]): + # faster inline check (than calling rsolve_poly) for a + # constant solution to a constant coefficient recurrence. + sol = [Symbol("C" + str(len(symbols)))] + else: + sol, syms = rsolve_poly(recurr_coeffs, 0, n, len(symbols), symbols=True) + sol = sol.collect(syms) + sol = [sol.coeff(s) for s in syms] + + for C in sol: + ratio = z * A * C.subs(n, n + 1) / B / C + ratio = simplify(ratio) + # If there is a nonnegative root in the denominator of the ratio, + # this indicates that the term y(n_root) is zero, and one should + # start the product with the term y(n_root + 1). + n0 = 0 + for n_root in roots(ratio.as_numer_denom()[1], n).keys(): + if n_root.has(I): + return None + elif (n0 < (n_root + 1)) == True: + n0 = n_root + 1 + K = product(ratio, (n, n0, n - 1)) + if K.has(factorial, FallingFactorial, RisingFactorial): + K = simplify(K) + + if casoratian(kernel + [K], n, zero=False) != 0: + kernel.append(K) + + kernel.sort(key=default_sort_key) + sk = list(zip(numbered_symbols('C'), kernel)) + + for C, ker in sk: + result += C * ker + + if hints.get('symbols', False): + # XXX: This returns the symbols in a non-deterministic order + symbols |= {s for s, k in sk} + return (result, list(symbols)) + else: + return result + + +def rsolve(f, y, init=None): + r""" + Solve univariate recurrence with rational coefficients. + + Given `k`-th order linear recurrence `\operatorname{L} y = f`, + or equivalently: + + .. math:: a_{k}(n) y(n+k) + a_{k-1}(n) y(n+k-1) + + \cdots + a_{0}(n) y(n) = f(n) + + where `a_{i}(n)`, for `i=0, \ldots, k`, are polynomials or rational + functions in `n`, and `f` is a hypergeometric function or a sum + of a fixed number of pairwise dissimilar hypergeometric terms in + `n`, finds all solutions or returns ``None``, if none were found. + + Initial conditions can be given as a dictionary in two forms: + + (1) ``{ n_0 : v_0, n_1 : v_1, ..., n_m : v_m}`` + (2) ``{y(n_0) : v_0, y(n_1) : v_1, ..., y(n_m) : v_m}`` + + or as a list ``L`` of values: + + ``L = [v_0, v_1, ..., v_m]`` + + where ``L[i] = v_i``, for `i=0, \ldots, m`, maps to `y(n_i)`. + + Examples + ======== + + Lets consider the following recurrence: + + .. math:: (n - 1) y(n + 2) - (n^2 + 3 n - 2) y(n + 1) + + 2 n (n + 1) y(n) = 0 + + >>> from sympy import Function, rsolve + >>> from sympy.abc import n + >>> y = Function('y') + + >>> f = (n - 1)*y(n + 2) - (n**2 + 3*n - 2)*y(n + 1) + 2*n*(n + 1)*y(n) + + >>> rsolve(f, y(n)) + 2**n*C0 + C1*factorial(n) + + >>> rsolve(f, y(n), {y(0):0, y(1):3}) + 3*2**n - 3*factorial(n) + + See Also + ======== + + rsolve_poly, rsolve_ratio, rsolve_hyper + + """ + if isinstance(f, Equality): + f = f.lhs - f.rhs + + n = y.args[0] + k = Wild('k', exclude=(n,)) + + # Preprocess user input to allow things like + # y(n) + a*(y(n + 1) + y(n - 1))/2 + f = f.expand().collect(y.func(Wild('m', integer=True))) + + h_part = defaultdict(list) + i_part = [] + for g in Add.make_args(f): + coeff, dep = g.as_coeff_mul(y.func) + if not dep: + i_part.append(coeff) + continue + for h in dep: + if h.is_Function and h.func == y.func: + result = h.args[0].match(n + k) + if result is not None: + h_part[int(result[k])].append(coeff) + continue + raise ValueError( + "'%s(%s + k)' expected, got '%s'" % (y.func, n, h)) + for k in h_part: + h_part[k] = Add(*h_part[k]) + h_part.default_factory = lambda: 0 + i_part = Add(*i_part) + + for k, coeff in h_part.items(): + h_part[k] = simplify(coeff) + + common = S.One + + if not i_part.is_zero and not i_part.is_hypergeometric(n) and \ + not (i_part.is_Add and all((x.is_hypergeometric(n) for x in i_part.expand().args))): + raise ValueError("The independent term should be a sum of hypergeometric functions, got '%s'" % i_part) + + for coeff in h_part.values(): + if coeff.is_rational_function(n): + if not coeff.is_polynomial(n): + common = lcm(common, coeff.as_numer_denom()[1], n) + else: + raise ValueError( + "Polynomial or rational function expected, got '%s'" % coeff) + + i_numer, i_denom = i_part.as_numer_denom() + + if i_denom.is_polynomial(n): + common = lcm(common, i_denom, n) + + if common is not S.One: + for k, coeff in h_part.items(): + numer, denom = coeff.as_numer_denom() + h_part[k] = numer*quo(common, denom, n) + + i_part = i_numer*quo(common, i_denom, n) + + K_min = min(h_part.keys()) + + if K_min < 0: + K = abs(K_min) + + H_part = defaultdict(lambda: S.Zero) + i_part = i_part.subs(n, n + K).expand() + common = common.subs(n, n + K).expand() + + for k, coeff in h_part.items(): + H_part[k + K] = coeff.subs(n, n + K).expand() + else: + H_part = h_part + + K_max = max(H_part.keys()) + coeffs = [H_part[i] for i in range(K_max + 1)] + + result = rsolve_hyper(coeffs, -i_part, n, symbols=True) + + if result is None: + return None + + solution, symbols = result + + if init in ({}, []): + init = None + + if symbols and init is not None: + if isinstance(init, list): + init = {i: init[i] for i in range(len(init))} + + equations = [] + + for k, v in init.items(): + try: + i = int(k) + except TypeError: + if k.is_Function and k.func == y.func: + i = int(k.args[0]) + else: + raise ValueError("Integer or term expected, got '%s'" % k) + + eq = solution.subs(n, i) - v + if eq.has(S.NaN): + eq = solution.limit(n, i) - v + equations.append(eq) + + result = solve(equations, *symbols) + + if not result: + return None + else: + solution = solution.subs(result) + + return solution diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/simplex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/simplex.py new file mode 100644 index 0000000000000000000000000000000000000000..c8e652cb626507d7829f9bc1c78fc6f49809865f --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/simplex.py @@ -0,0 +1,1104 @@ +"""Tools for optimizing a linear function for a given simplex. + +For the linear objective function ``f`` with linear constraints +expressed using `Le`, `Ge` or `Eq` can be found with ``lpmin`` or +``lpmax``. The symbols are **unbounded** unless specifically +constrained. + +As an alternative, the matrices describing the objective and the +constraints, and an optional list of bounds can be passed to +``linprog`` which will solve for the minimization of ``C*x`` +under constraints ``A*x <= b`` and/or ``Aeq*x = beq``, and +individual bounds for variables given as ``(lo, hi)``. The values +returned are **nonnegative** unless bounds are provided that +indicate otherwise. + +Errors that might be raised are UnboundedLPError when there is no +finite solution for the system or InfeasibleLPError when the +constraints represent impossible conditions (i.e. a non-existent + simplex). + +Here is a simple 1-D system: minimize `x` given that ``x >= 1``. + + >>> from sympy.solvers.simplex import lpmin, linprog + >>> from sympy.abc import x + + The function and a list with the constraint is passed directly + to `lpmin`: + + >>> lpmin(x, [x >= 1]) + (1, {x: 1}) + + For `linprog` the matrix for the objective is `[1]` and the + uivariate constraint can be passed as a bound with None acting + as infinity: + + >>> linprog([1], bounds=(1, None)) + (1, [1]) + + Or the matrices, corresponding to ``x >= 1`` expressed as + ``-x <= -1`` as required by the routine, can be passed: + + >>> linprog([1], [-1], [-1]) + (1, [1]) + + If there is no limit for the objective, an error is raised. + In this case there is a valid region of interest (simplex) + but no limit to how small ``x`` can be: + + >>> lpmin(x, []) + Traceback (most recent call last): + ... + sympy.solvers.simplex.UnboundedLPError: + Objective function can assume arbitrarily large values! + + An error is raised if there is no possible solution: + + >>> lpmin(x,[x<=1,x>=2]) + Traceback (most recent call last): + ... + sympy.solvers.simplex.InfeasibleLPError: + Inconsistent/False constraint +""" + +from sympy.core import sympify +from sympy.core.exprtools import factor_terms +from sympy.core.relational import Le, Ge, Eq +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.core.sorting import ordered +from sympy.functions.elementary.complexes import sign +from sympy.matrices.dense import Matrix, zeros +from sympy.solvers.solveset import linear_eq_to_matrix +from sympy.utilities.iterables import numbered_symbols +from sympy.utilities.misc import filldedent + + +class UnboundedLPError(Exception): + """ + A linear programming problem is said to be unbounded if its objective + function can assume arbitrarily large values. + + Example + ======= + + Suppose you want to maximize + 2x + subject to + x >= 0 + + There's no upper limit that 2x can take. + """ + + pass + + +class InfeasibleLPError(Exception): + """ + A linear programming problem is considered infeasible if its + constraint set is empty. That is, if the set of all vectors + satisfying the constraints is empty, then the problem is infeasible. + + Example + ======= + + Suppose you want to maximize + x + subject to + x >= 10 + x <= 9 + + No x can satisfy those constraints. + """ + + pass + + +def _pivot(M, i, j): + """ + The pivot element `M[i, j]` is inverted and the rest of the matrix + modified and returned as a new matrix; original is left unmodified. + + Example + ======= + + >>> from sympy.matrices.dense import Matrix + >>> from sympy.solvers.simplex import _pivot + >>> from sympy import var + >>> Matrix(3, 3, var('a:i')) + Matrix([ + [a, b, c], + [d, e, f], + [g, h, i]]) + >>> _pivot(_, 1, 0) + Matrix([ + [-a/d, -a*e/d + b, -a*f/d + c], + [ 1/d, e/d, f/d], + [-g/d, h - e*g/d, i - f*g/d]]) + """ + Mi, Mj, Mij = M[i, :], M[:, j], M[i, j] + if Mij == 0: + raise ZeroDivisionError( + "Tried to pivot about zero-valued entry.") + A = M - Mj * (Mi / Mij) + A[i, :] = Mi / Mij + A[:, j] = -Mj / Mij + A[i, j] = 1 / Mij + return A + + +def _choose_pivot_row(A, B, candidate_rows, pivot_col, Y): + # Choose row with smallest ratio + # If there are ties, pick using Bland's rule + return min(candidate_rows, key=lambda i: (B[i] / A[i, pivot_col], Y[i])) + + +def _simplex(A, B, C, D=None, dual=False): + """Return ``(o, x, y)`` obtained from the two-phase simplex method + using Bland's rule: ``o`` is the minimum value of primal, + ``Cx - D``, under constraints ``Ax <= B`` (with ``x >= 0``) and + the maximum of the dual, ``y^{T}B - D``, under constraints + ``A^{T}*y >= C^{T}`` (with ``y >= 0``). To compute the dual of + the system, pass `dual=True` and ``(o, y, x)`` will be returned. + + Note: the nonnegative constraints for ``x`` and ``y`` supercede + any values of ``A`` and ``B`` that are inconsistent with that + assumption, so if a constraint of ``x >= -1`` is represented + in ``A`` and ``B``, no value will be obtained that is negative; if + a constraint of ``x <= -1`` is represented, an error will be + raised since no solution is possible. + + This routine relies on the ability of determining whether an + expression is 0 or not. This is guaranteed if the input contains + only Float or Rational entries. It will raise a TypeError if + a relationship does not evaluate to True or False. + + Examples + ======== + + >>> from sympy.solvers.simplex import _simplex + >>> from sympy import Matrix + + Consider the simple minimization of ``f = x + y + 1`` under the + constraint that ``y + 2*x >= 4``. This is the "standard form" of + a minimization. + + In the nonnegative quadrant, this inequality describes a area above + a triangle with vertices at (0, 4), (0, 0) and (2, 0). The minimum + of ``f`` occurs at (2, 0). Define A, B, C, D for the standard + minimization: + + >>> A = Matrix([[2, 1]]) + >>> B = Matrix([4]) + >>> C = Matrix([[1, 1]]) + >>> D = Matrix([-1]) + + Confirm that this is the system of interest: + + >>> from sympy.abc import x, y + >>> X = Matrix([x, y]) + >>> (C*X - D)[0] + x + y + 1 + >>> [i >= j for i, j in zip(A*X, B)] + [2*x + y >= 4] + + Since `_simplex` will do a minimization for constraints given as + ``A*x <= B``, the signs of ``A`` and ``B`` must be negated since + the currently correspond to a greater-than inequality: + + >>> _simplex(-A, -B, C, D) + (3, [2, 0], [1/2]) + + The dual of minimizing ``f`` is maximizing ``F = c*y - d`` for + ``a*y <= b`` where ``a``, ``b``, ``c``, ``d`` are derived from the + transpose of the matrix representation of the standard minimization: + + >>> tr = lambda a, b, c, d: [i.T for i in (a, c, b, d)] + >>> a, b, c, d = tr(A, B, C, D) + + This time ``a*x <= b`` is the expected inequality for the `_simplex` + method, but to maximize ``F``, the sign of ``c`` and ``d`` must be + changed (so that minimizing the negative will give the negative of + the maximum of ``F``): + + >>> _simplex(a, b, -c, -d) + (-3, [1/2], [2, 0]) + + The negative of ``F`` and the min of ``f`` are the same. The dual + point `[1/2]` is the value of ``y`` that minimized ``F = c*y - d`` + under constraints a*x <= b``: + + >>> y = Matrix(['y']) + >>> (c*y - d)[0] + 4*y + 1 + >>> [i <= j for i, j in zip(a*y,b)] + [2*y <= 1, y <= 1] + + In this 1-dimensional dual system, the more restrictive constraint is + the first which limits ``y`` between 0 and 1/2 and the maximum of + ``F`` is attained at the nonzero value, hence is ``4*(1/2) + 1 = 3``. + + In this case the values for ``x`` and ``y`` were the same when the + dual representation was solved. This is not always the case (though + the value of the function will be the same). + + >>> l = [[1, 1], [-1, 1], [0, 1], [-1, 0]], [5, 1, 2, -1], [[1, 1]], [-1] + >>> A, B, C, D = [Matrix(i) for i in l] + >>> _simplex(A, B, -C, -D) + (-6, [3, 2], [1, 0, 0, 0]) + >>> _simplex(A, B, -C, -D, dual=True) # [5, 0] != [3, 2] + (-6, [1, 0, 0, 0], [5, 0]) + + In both cases the function has the same value: + + >>> Matrix(C)*Matrix([3, 2]) == Matrix(C)*Matrix([5, 0]) + True + + See Also + ======== + _lp - poses min/max problem in form compatible with _simplex + lpmin - minimization which calls _lp + lpmax - maximimzation which calls _lp + + References + ========== + + .. [1] Thomas S. Ferguson, LINEAR PROGRAMMING: A Concise Introduction + web.tecnico.ulisboa.pt/mcasquilho/acad/or/ftp/FergusonUCLA_lp.pdf + + """ + A, B, C, D = [Matrix(i) for i in (A, B, C, D or [0])] + if dual: + _o, d, p = _simplex(-A.T, C.T, B.T, -D) + return -_o, d, p + + if A and B: + M = Matrix([[A, B], [C, D]]) + else: + if A or B: + raise ValueError("must give A and B") + # no constraints given + M = Matrix([[C, D]]) + n = M.cols - 1 + m = M.rows - 1 + + if not all(i.is_Float or i.is_Rational for i in M): + # with literal Float and Rational we are guaranteed the + # ability of determining whether an expression is 0 or not + raise TypeError(filldedent(""" + Only rationals and floats are allowed. + """ + ) + ) + + # x variables have priority over y variables during Bland's rule + # since False < True + X = [(False, j) for j in range(n)] + Y = [(True, i) for i in range(m)] + + # Phase 1: find a feasible solution or determine none exist + + ## keep track of last pivot row and column + last = None + + while True: + B = M[:-1, -1] + A = M[:-1, :-1] + if all(B[i] >= 0 for i in range(B.rows)): + # We have found a feasible solution + break + + # Find k: first row with a negative rightmost entry + for k in range(B.rows): + if B[k] < 0: + break # use current value of k below + else: + pass # error will raise below + + # Choose pivot column, c + piv_cols = [_ for _ in range(A.cols) if A[k, _] < 0] + if not piv_cols: + raise InfeasibleLPError(filldedent(""" + The constraint set is empty!""")) + _, c = min((X[i], i) for i in piv_cols) # Bland's rule + + # Choose pivot row, r + piv_rows = [_ for _ in range(A.rows) if A[_, c] > 0 and B[_] > 0] + piv_rows.append(k) + r = _choose_pivot_row(A, B, piv_rows, c, Y) + + # check for oscillation + if (r, c) == last: + # Not sure what to do here; it looks like there will be + # oscillations; see o1 test added at this commit to + # see a system with no solution and the o2 for one + # with a solution. In the case of o2, the solution + # from linprog is the same as the one from lpmin, but + # the matrices created in the lpmin case are different + # than those created without replacements in linprog and + # the matrices in the linprog case lead to oscillations. + # If the matrices could be re-written in linprog like + # lpmin does, this behavior could be avoided and then + # perhaps the oscillating case would only occur when + # there is no solution. For now, the output is checked + # before exit if oscillations were detected and an + # error is raised there if the solution was invalid. + # + # cf section 6 of Ferguson for a non-cycling modification + last = True + break + last = r, c + + M = _pivot(M, r, c) + X[c], Y[r] = Y[r], X[c] + + # Phase 2: from a feasible solution, pivot to optimal + while True: + B = M[:-1, -1] + A = M[:-1, :-1] + C = M[-1, :-1] + + # Choose a pivot column, c + piv_cols = [_ for _ in range(n) if C[_] < 0] + if not piv_cols: + break + _, c = min((X[i], i) for i in piv_cols) # Bland's rule + + # Choose a pivot row, r + piv_rows = [_ for _ in range(m) if A[_, c] > 0] + if not piv_rows: + raise UnboundedLPError(filldedent(""" + Objective function can assume + arbitrarily large values!""")) + r = _choose_pivot_row(A, B, piv_rows, c, Y) + + M = _pivot(M, r, c) + X[c], Y[r] = Y[r], X[c] + + argmax = [None] * n + argmin_dual = [None] * m + + for i, (v, n) in enumerate(X): + if v == False: + argmax[n] = 0 + else: + argmin_dual[n] = M[-1, i] + + for i, (v, n) in enumerate(Y): + if v == True: + argmin_dual[n] = 0 + else: + argmax[n] = M[i, -1] + + if last and not all(i >= 0 for i in argmax + argmin_dual): + raise InfeasibleLPError(filldedent(""" + Oscillating system led to invalid solution. + If you believe there was a valid solution, please + report this as a bug.""")) + return -M[-1, -1], argmax, argmin_dual + + +## routines that use _simplex or support those that do + + +def _abcd(M, list=False): + """return parts of M as matrices or lists + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.solvers.simplex import _abcd + + >>> m = Matrix(3, 3, range(9)); m + Matrix([ + [0, 1, 2], + [3, 4, 5], + [6, 7, 8]]) + >>> a, b, c, d = _abcd(m) + >>> a + Matrix([ + [0, 1], + [3, 4]]) + >>> b + Matrix([ + [2], + [5]]) + >>> c + Matrix([[6, 7]]) + >>> d + Matrix([[8]]) + + The matrices can be returned as compact lists, too: + + >>> L = a, b, c, d = _abcd(m, list=True); L + ([[0, 1], [3, 4]], [2, 5], [[6, 7]], [8]) + """ + + def aslist(i): + l = i.tolist() + if len(l[0]) == 1: # col vector + return [i[0] for i in l] + return l + + m = M[:-1, :-1], M[:-1, -1], M[-1, :-1], M[-1:, -1:] + if not list: + return m + return tuple([aslist(i) for i in m]) + + +def _m(a, b, c, d=None): + """return Matrix([[a, b], [c, d]]) from matrices + in Matrix or list form. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.solvers.simplex import _abcd, _m + >>> m = Matrix(3, 3, range(9)) + >>> L = _abcd(m, list=True); L + ([[0, 1], [3, 4]], [2, 5], [[6, 7]], [8]) + >>> _abcd(m) + (Matrix([ + [0, 1], + [3, 4]]), Matrix([ + [2], + [5]]), Matrix([[6, 7]]), Matrix([[8]])) + >>> assert m == _m(*L) == _m(*_) + """ + a, b, c, d = [Matrix(i) for i in (a, b, c, d or [0])] + return Matrix([[a, b], [c, d]]) + + +def _primal_dual(M, factor=True): + """return primal and dual function and constraints + assuming that ``M = Matrix([[A, b], [c, d]])`` and the + function ``c*x - d`` is being minimized with ``Ax >= b`` + for nonnegative values of ``x``. The dual and its + constraints will be for maximizing `b.T*y - d` subject + to ``A.T*y <= c.T``. + + Examples + ======== + + >>> from sympy.solvers.simplex import _primal_dual, lpmin, lpmax + >>> from sympy import Matrix + + The following matrix represents the primal task of + minimizing x + y + 7 for y >= x + 1 and y >= -2*x + 3. + The dual task seeks to maximize x + 3*y + 7 with + 2*y - x <= 1 and and x + y <= 1: + + >>> M = Matrix([ + ... [-1, 1, 1], + ... [ 2, 1, 3], + ... [ 1, 1, -7]]) + >>> p, d = _primal_dual(M) + + The minimum of the primal and maximum of the dual are the same + (though they occur at different points): + + >>> lpmin(*p) + (28/3, {x1: 2/3, x2: 5/3}) + >>> lpmax(*d) + (28/3, {y1: 1/3, y2: 2/3}) + + If the equivalent (but canonical) inequalities are + desired, leave `factor=True`, otherwise the unmodified + inequalities for M will be returned. + + >>> m = Matrix([ + ... [-3, -2, 4, -2], + ... [ 2, 0, 0, -2], + ... [ 0, 1, -3, 0]]) + + >>> _primal_dual(m, False) # last condition is 2*x1 >= -2 + ((x2 - 3*x3, + [-3*x1 - 2*x2 + 4*x3 >= -2, 2*x1 >= -2]), + (-2*y1 - 2*y2, + [-3*y1 + 2*y2 <= 0, -2*y1 <= 1, 4*y1 <= -3])) + + >>> _primal_dual(m) # condition now x1 >= -1 + ((x2 - 3*x3, + [-3*x1 - 2*x2 + 4*x3 >= -2, x1 >= -1]), + (-2*y1 - 2*y2, + [-3*y1 + 2*y2 <= 0, -2*y1 <= 1, 4*y1 <= -3])) + + If you pass the transpose of the matrix, the primal will be + identified as the standard minimization problem and the + dual as the standard maximization: + + >>> _primal_dual(m.T) + ((-2*x1 - 2*x2, + [-3*x1 + 2*x2 >= 0, -2*x1 >= 1, 4*x1 >= -3]), + (y2 - 3*y3, + [-3*y1 - 2*y2 + 4*y3 <= -2, y1 <= -1])) + + A matrix must have some size or else None will be returned for + the functions: + + >>> _primal_dual(Matrix([[1, 2]])) + ((x1 - 2, []), (-2, [])) + + >>> _primal_dual(Matrix([])) + ((None, []), (None, [])) + + References + ========== + + .. [1] David Galvin, Relations between Primal and Dual + www3.nd.edu/~dgalvin1/30210/30210_F07/presentations/dual_opt.pdf + """ + if not M: + return (None, []), (None, []) + if not hasattr(M, "shape"): + if len(M) not in (3, 4): + raise ValueError("expecting Matrix or 3 or 4 lists") + M = _m(*M) + m, n = [i - 1 for i in M.shape] + A, b, c, d = _abcd(M) + d = d[0] + _ = lambda x: numbered_symbols(x, start=1) + x = Matrix([i for i, j in zip(_("x"), range(n))]) + yT = Matrix([i for i, j in zip(_("y"), range(m))]).T + + def ineq(L, r, op): + rv = [] + for r in (op(i, j) for i, j in zip(L, r)): + if r == True: + continue + elif r == False: + return [False] + if factor: + f = factor_terms(r) + if f.lhs.is_Mul and f.rhs % f.lhs.args[0] == 0: + assert len(f.lhs.args) == 2, f.lhs + k = f.lhs.args[0] + r = r.func(sign(k) * f.lhs.args[1], f.rhs // abs(k)) + rv.append(r) + return rv + + eq = lambda x, d: x[0] - d if x else -d + F = eq(c * x, d) + f = eq(yT * b, d) + return (F, ineq(A * x, b, Ge)), (f, ineq(yT * A, c, Le)) + + +def _rel_as_nonpos(constr, syms): + """return `(np, d, aux)` where `np` is a list of nonpositive + expressions that represent the given constraints (possibly + rewritten in terms of auxilliary variables) expressible with + nonnegative symbols, and `d` is a dictionary mapping a given + symbols to an expression with an auxilliary variable. In some + cases a symbol will be used as part of the change of variables, + e.g. x: x - z1 instead of x: z1 - z2. + + If any constraint is False/empty, return None. All variables in + ``constr`` are assumed to be unbounded unless explicitly indicated + otherwise with a univariate constraint, e.g. ``x >= 0`` will + restrict ``x`` to nonnegative values. + + The ``syms`` must be included so all symbols can be given an + unbounded assumption if they are not otherwise bound with + univariate conditions like ``x <= 3``. + + Examples + ======== + + >>> from sympy.solvers.simplex import _rel_as_nonpos + >>> from sympy.abc import x, y + >>> _rel_as_nonpos([x >= y, x >= 0, y >= 0], (x, y)) + ([-x + y], {}, []) + >>> _rel_as_nonpos([x >= 3, x <= 5], [x]) + ([_z1 - 2], {x: _z1 + 3}, [_z1]) + >>> _rel_as_nonpos([x <= 5], [x]) + ([], {x: 5 - _z1}, [_z1]) + >>> _rel_as_nonpos([x >= 1], [x]) + ([], {x: _z1 + 1}, [_z1]) + """ + r = {} # replacements to handle change of variables + np = [] # nonpositive expressions + aux = [] # auxilliary symbols added + ui = numbered_symbols("z", start=1, cls=Dummy) # auxilliary symbols + univariate = {} # {x: interval} for univariate constraints + unbound = [] # symbols designated as unbound + syms = set(syms) # the expected syms of the system + + # separate out univariates + for i in constr: + if i == True: + continue # ignore + if i == False: + return # no solution + if i.has(S.Infinity, S.NegativeInfinity): + raise ValueError("only finite bounds are permitted") + if isinstance(i, (Le, Ge)): + i = i.lts - i.gts + freei = i.free_symbols + if freei - syms: + raise ValueError( + "unexpected symbol(s) in constraint: %s" % (freei - syms) + ) + if len(freei) > 1: + np.append(i) + elif freei: + x = freei.pop() + if x in unbound: + continue # will handle later + ivl = Le(i, 0, evaluate=False).as_set() + if x not in univariate: + univariate[x] = ivl + else: + univariate[x] &= ivl + elif i: + return False + else: + raise TypeError(filldedent(""" + only equalities like Eq(x, y) or non-strict + inequalities like x >= y are allowed in lp, not %s""" % i)) + + # introduce auxilliary variables as needed for univariate + # inequalities + for x in syms: + i = univariate.get(x, True) + if not i: + return None # no solution possible + if i == True: + unbound.append(x) + continue + a, b = i.inf, i.sup + if a.is_infinite: + u = next(ui) + r[x] = b - u + aux.append(u) + elif b.is_infinite: + if a: + u = next(ui) + r[x] = a + u + aux.append(u) + else: + # standard nonnegative relationship + pass + else: + u = next(ui) + aux.append(u) + # shift so u = x - a => x = u + a + r[x] = u + a + # add constraint for u <= b - a + # since when u = b-a then x = u + a = b - a + a = b: + # the upper limit for x + np.append(u - (b - a)) + + # make change of variables for unbound variables + for x in unbound: + u = next(ui) + r[x] = u - x # reusing x + aux.append(u) + + return np, r, aux + + +def _lp_matrices(objective, constraints): + """return A, B, C, D, r, x+X, X for maximizing + objective = Cx - D with constraints Ax <= B, introducing + introducing auxilliary variables, X, as necessary to make + replacements of symbols as given in r, {xi: expression with Xj}, + so all variables in x+X will take on nonnegative values. + + Every univariate condition creates a semi-infinite + condition, e.g. a single ``x <= 3`` creates the + interval ``[-oo, 3]`` while ``x <= 3`` and ``x >= 2`` + create an interval ``[2, 3]``. Variables not in a univariate + expression will take on nonnegative values. + """ + + # sympify input and collect free symbols + F = sympify(objective) + np = [sympify(i) for i in constraints] + syms = set.union(*[i.free_symbols for i in [F] + np], set()) + + # change Eq(x, y) to x - y <= 0 and y - x <= 0 + for i in range(len(np)): + if isinstance(np[i], Eq): + np[i] = np[i].lhs - np[i].rhs <= 0 + np.append(-np[i].lhs <= 0) + + # convert constraints to nonpositive expressions + _ = _rel_as_nonpos(np, syms) + if _ is None: + raise InfeasibleLPError(filldedent(""" + Inconsistent/False constraint""")) + np, r, aux = _ + + # do change of variables + F = F.xreplace(r) + np = [i.xreplace(r) for i in np] + + # convert to matrices + xx = list(ordered(syms)) + aux + A, B = linear_eq_to_matrix(np, xx) + C, D = linear_eq_to_matrix([F], xx) + return A, B, C, D, r, xx, aux + + +def _lp(min_max, f, constr): + """Return the optimization (min or max) of ``f`` with the given + constraints. All variables are unbounded unless constrained. + + If `min_max` is 'max' then the results corresponding to the + maximization of ``f`` will be returned, else the minimization. + The constraints can be given as Le, Ge or Eq expressions. + + Examples + ======== + + >>> from sympy.solvers.simplex import _lp as lp + >>> from sympy import Eq + >>> from sympy.abc import x, y, z + >>> f = x + y - 2*z + >>> c = [7*x + 4*y - 7*z <= 3, 3*x - y + 10*z <= 6] + >>> c += [i >= 0 for i in (x, y, z)] + >>> lp(min, f, c) + (-6/5, {x: 0, y: 0, z: 3/5}) + + By passing max, the maximum value for f under the constraints + is returned (if possible): + + >>> lp(max, f, c) + (3/4, {x: 0, y: 3/4, z: 0}) + + Constraints that are equalities will require that the solution + also satisfy them: + + >>> lp(max, f, c + [Eq(y - 9*x, 1)]) + (5/7, {x: 0, y: 1, z: 1/7}) + + All symbols are reported, even if they are not in the objective + function: + + >>> lp(min, x, [y + x >= 3, x >= 0]) + (0, {x: 0, y: 3}) + """ + # get the matrix components for the system expressed + # in terms of only nonnegative variables + A, B, C, D, r, xx, aux = _lp_matrices(f, constr) + + how = str(min_max).lower() + if "max" in how: + # _simplex minimizes for Ax <= B so we + # have to change the sign of the function + # and negate the optimal value returned + _o, p, d = _simplex(A, B, -C, -D) + o = -_o + elif "min" in how: + o, p, d = _simplex(A, B, C, D) + else: + raise ValueError("expecting min or max") + + # restore original variables and remove aux from p + p = dict(zip(xx, p)) + if r: # p has original symbols and auxilliary symbols + # if r has x: x - z1 use values from p to update + r = {k: v.xreplace(p) for k, v in r.items()} + # then use the actual value of x (= x - z1) in p + p.update(r) + # don't show aux + p = {k: p[k] for k in ordered(p) if k not in aux} + + # not returning dual since there may be extra constraints + # when a variable has finite bounds + return o, p + + +def lpmin(f, constr): + """return minimum of linear equation ``f`` under + linear constraints expressed using Ge, Le or Eq. + + All variables are unbounded unless constrained. + + Examples + ======== + + >>> from sympy.solvers.simplex import lpmin + >>> from sympy import Eq + >>> from sympy.abc import x, y + >>> lpmin(x, [2*x - 3*y >= -1, Eq(x + 3*y, 2), x <= 2*y]) + (1/3, {x: 1/3, y: 5/9}) + + Negative values for variables are permitted unless explicitly + excluding, so minimizing ``x`` for ``x <= 3`` is an + unbounded problem while the following has a bounded solution: + + >>> lpmin(x, [x >= 0, x <= 3]) + (0, {x: 0}) + + Without indicating that ``x`` is nonnegative, there + is no minimum for this objective: + + >>> lpmin(x, [x <= 3]) + Traceback (most recent call last): + ... + sympy.solvers.simplex.UnboundedLPError: + Objective function can assume arbitrarily large values! + + See Also + ======== + linprog, lpmax + """ + return _lp(min, f, constr) + + +def lpmax(f, constr): + """return maximum of linear equation ``f`` under + linear constraints expressed using Ge, Le or Eq. + + All variables are unbounded unless constrained. + + Examples + ======== + + >>> from sympy.solvers.simplex import lpmax + >>> from sympy import Eq + >>> from sympy.abc import x, y + >>> lpmax(x, [2*x - 3*y >= -1, Eq(x+ 3*y,2), x <= 2*y]) + (4/5, {x: 4/5, y: 2/5}) + + Negative values for variables are permitted unless explicitly + excluding: + + >>> lpmax(x, [x <= -1]) + (-1, {x: -1}) + + If a non-negative constraint is added for x, there is no + possible solution: + + >>> lpmax(x, [x <= -1, x >= 0]) + Traceback (most recent call last): + ... + sympy.solvers.simplex.InfeasibleLPError: inconsistent/False constraint + + See Also + ======== + linprog, lpmin + """ + return _lp(max, f, constr) + + +def _handle_bounds(bounds): + # introduce auxiliary variables as needed for univariate + # inequalities + + def _make_list(length: int, index_value_pairs): + li = [0] * length + for idx, val in index_value_pairs: + li[idx] = val + return li + + unbound = [] + row = [] + row2 = [] + b_len = len(bounds) + for x, (a, b) in enumerate(bounds): + if a is None and b is None: + unbound.append(x) + elif a is None: + # r[x] = b - u + b_len += 1 + row.append(_make_list(b_len, [(x, 1), (-1, 1)])) + row.append(_make_list(b_len, [(x, -1), (-1, -1)])) + row2.extend([[b], [-b]]) + elif b is None: + if a: + # r[x] = a + u + b_len += 1 + row.append(_make_list(b_len, [(x, 1), (-1, -1)])) + row.append(_make_list(b_len, [(x, -1), (-1, 1)])) + row2.extend([[a], [-a]]) + else: + # standard nonnegative relationship + pass + else: + # r[x] = u + a + b_len += 1 + row.append(_make_list(b_len, [(x, 1), (-1, -1)])) + row.append(_make_list(b_len, [(x, -1), (-1, 1)])) + # u <= b - a + row.append(_make_list(b_len, [(-1, 1)])) + row2.extend([[a], [-a], [b - a]]) + + # make change of variables for unbound variables + for x in unbound: + # r[x] = u - v + b_len += 2 + row.append(_make_list(b_len, [(x, 1), (-1, 1), (-2, -1)])) + row.append(_make_list(b_len, [(x, -1), (-1, -1), (-2, 1)])) + row2.extend([[0], [0]]) + + return Matrix([r + [0]*(b_len - len(r)) for r in row]), Matrix(row2) + + +def linprog(c, A=None, b=None, A_eq=None, b_eq=None, bounds=None): + """Return the minimization of ``c*x`` with the given + constraints ``A*x <= b`` and ``A_eq*x = b_eq``. Unless bounds + are given, variables will have nonnegative values in the solution. + + If ``A`` is not given, then the dimension of the system will + be determined by the length of ``C``. + + By default, all variables will be nonnegative. If ``bounds`` + is given as a single tuple, ``(lo, hi)``, then all variables + will be constrained to be between ``lo`` and ``hi``. Use + None for a ``lo`` or ``hi`` if it is unconstrained in the + negative or positive direction, respectively, e.g. + ``(None, 0)`` indicates nonpositive values. To set + individual ranges, pass a list with length equal to the + number of columns in ``A``, each element being a tuple; if + only a few variables take on non-default values they can be + passed as a dictionary with keys giving the corresponding + column to which the variable is assigned, e.g. ``bounds={2: + (1, 4)}`` would limit the 3rd variable to have a value in + range ``[1, 4]``. + + Examples + ======== + + >>> from sympy.solvers.simplex import linprog + >>> from sympy import symbols, Eq, linear_eq_to_matrix as M, Matrix + >>> x = x1, x2, x3, x4 = symbols('x1:5') + >>> X = Matrix(x) + >>> c, d = M(5*x2 + x3 + 4*x4 - x1, x) + >>> a, b = M([5*x2 + 2*x3 + 5*x4 - (x1 + 5)], x) + >>> aeq, beq = M([Eq(3*x2 + x4, 2), Eq(-x1 + x3 + 2*x4, 1)], x) + >>> constr = [i <= j for i,j in zip(a*X, b)] + >>> constr += [Eq(i, j) for i,j in zip(aeq*X, beq)] + >>> linprog(c, a, b, aeq, beq) + (9/2, [0, 1/2, 0, 1/2]) + >>> assert all(i.subs(dict(zip(x, _[1]))) for i in constr) + + See Also + ======== + lpmin, lpmax + """ + + ## the objective + C = Matrix(c) + if C.rows != 1 and C.cols == 1: + C = C.T + if C.rows != 1: + raise ValueError("C must be a single row.") + + ## the inequalities + if not A: + if b: + raise ValueError("A and b must both be given") + # the governing equations will be simple constraints + # on variables + A, b = zeros(0, C.cols), zeros(C.cols, 1) + else: + A, b = [Matrix(i) for i in (A, b)] + + if A.cols != C.cols: + raise ValueError("number of columns in A and C must match") + + ## the equalities + if A_eq is None: + if not b_eq is None: + raise ValueError("A_eq and b_eq must both be given") + else: + A_eq, b_eq = [Matrix(i) for i in (A_eq, b_eq)] + # if x == y then x <= y and x >= y (-x <= -y) + A = A.col_join(A_eq) + A = A.col_join(-A_eq) + b = b.col_join(b_eq) + b = b.col_join(-b_eq) + + if not (bounds is None or bounds == {} or bounds == (0, None)): + ## the bounds are interpreted + if type(bounds) is tuple and len(bounds) == 2: + bounds = [bounds] * A.cols + elif len(bounds) == A.cols and all( + type(i) is tuple and len(i) == 2 for i in bounds): + pass # individual bounds + elif type(bounds) is dict and all( + type(i) is tuple and len(i) == 2 + for i in bounds.values()): + # sparse bounds + db = bounds + bounds = [(0, None)] * A.cols + while db: + i, j = db.popitem() + bounds[i] = j # IndexError if out-of-bounds indices + else: + raise ValueError("unexpected bounds %s" % bounds) + A_, b_ = _handle_bounds(bounds) + aux = A_.cols - A.cols + if A: + A = Matrix([[A, zeros(A.rows, aux)], [A_]]) + b = b.col_join(b_) + else: + A = A_ + b = b_ + C = C.row_join(zeros(1, aux)) + else: + aux = -A.cols # set so -aux will give all cols below + + o, p, d = _simplex(A, b, C) + return o, p[:-aux] # don't include aux values + +def show_linprog(c, A=None, b=None, A_eq=None, b_eq=None, bounds=None): + from sympy import symbols + ## the objective + C = Matrix(c) + if C.rows != 1 and C.cols == 1: + C = C.T + if C.rows != 1: + raise ValueError("C must be a single row.") + + ## the inequalities + if not A: + if b: + raise ValueError("A and b must both be given") + # the governing equations will be simple constraints + # on variables + A, b = zeros(0, C.cols), zeros(C.cols, 1) + else: + A, b = [Matrix(i) for i in (A, b)] + + if A.cols != C.cols: + raise ValueError("number of columns in A and C must match") + + ## the equalities + if A_eq is None: + if not b_eq is None: + raise ValueError("A_eq and b_eq must both be given") + else: + A_eq, b_eq = [Matrix(i) for i in (A_eq, b_eq)] + + if not (bounds is None or bounds == {} or bounds == (0, None)): + ## the bounds are interpreted + if type(bounds) is tuple and len(bounds) == 2: + bounds = [bounds] * A.cols + elif len(bounds) == A.cols and all( + type(i) is tuple and len(i) == 2 for i in bounds): + pass # individual bounds + elif type(bounds) is dict and all( + type(i) is tuple and len(i) == 2 + for i in bounds.values()): + # sparse bounds + db = bounds + bounds = [(0, None)] * A.cols + while db: + i, j = db.popitem() + bounds[i] = j # IndexError if out-of-bounds indices + else: + raise ValueError("unexpected bounds %s" % bounds) + + x = Matrix(symbols('x1:%s' % (A.cols+1))) + f,c = (C*x)[0], [i<=j for i,j in zip(A*x, b)] + [Eq(i,j) for i,j in zip(A_eq*x,b_eq)] + for i, (lo, hi) in enumerate(bounds): + if lo is not None: + c.append(x[i]>=lo) + if hi is not None: + c.append(x[i]<=hi) + return f,c diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solvers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..ef621a84e34bde43a3181d2fd90e26fa7b05e968 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solvers.py @@ -0,0 +1,3674 @@ +""" +This module contain solvers for all kinds of equations: + + - algebraic or transcendental, use solve() + + - recurrence, use rsolve() + + - differential, use dsolve() + + - nonlinear (numerically), use nsolve() + (you will need a good starting point) + +""" +from __future__ import annotations + +from sympy.core import (S, Add, Symbol, Dummy, Expr, Mul) +from sympy.core.assumptions import check_assumptions +from sympy.core.exprtools import factor_terms +from sympy.core.function import (expand_mul, expand_log, Derivative, + AppliedUndef, UndefinedFunction, nfloat, + Function, expand_power_exp, _mexpand, expand, + expand_func) +from sympy.core.logic import fuzzy_not, fuzzy_and +from sympy.core.numbers import Float, Rational, _illegal +from sympy.core.intfunc import integer_log, ilcm +from sympy.core.power import Pow +from sympy.core.relational import Eq, Ne +from sympy.core.sorting import ordered, default_sort_key +from sympy.core.sympify import sympify, _sympify +from sympy.core.traversal import preorder_traversal +from sympy.logic.boolalg import And, BooleanAtom + +from sympy.functions import (log, exp, LambertW, cos, sin, tan, acos, asin, atan, + Abs, re, im, arg, sqrt, atan2) +from sympy.functions.combinatorial.factorials import binomial +from sympy.functions.elementary.hyperbolic import HyperbolicFunction +from sympy.functions.elementary.piecewise import piecewise_fold, Piecewise +from sympy.functions.elementary.trigonometric import TrigonometricFunction +from sympy.integrals.integrals import Integral +from sympy.ntheory.factor_ import divisors +from sympy.simplify import (simplify, collect, powsimp, posify, # type: ignore + powdenest, nsimplify, denom, logcombine, sqrtdenest, fraction, + separatevars) +from sympy.simplify.sqrtdenest import sqrt_depth +from sympy.simplify.fu import TR1, TR2i, TR10, TR11 +from sympy.strategies.rl import rebuild +from sympy.matrices.exceptions import NonInvertibleMatrixError +from sympy.matrices import Matrix, zeros +from sympy.polys import roots, cancel, factor, Poly +from sympy.polys.solvers import sympy_eqs_to_ring, solve_lin_sys +from sympy.polys.polyerrors import GeneratorsNeeded, PolynomialError +from sympy.polys.polytools import gcd +from sympy.utilities.lambdify import lambdify +from sympy.utilities.misc import filldedent, debugf +from sympy.utilities.iterables import (connected_components, + generate_bell, uniq, iterable, is_sequence, subsets, flatten, sift) +from sympy.utilities.decorator import conserve_mpmath_dps + +from mpmath import findroot + +from sympy.solvers.polysys import solve_poly_system + +from types import GeneratorType +from collections import defaultdict +from itertools import combinations, product + +import warnings + + +def recast_to_symbols(eqs, symbols): + """ + Return (e, s, d) where e and s are versions of *eqs* and + *symbols* in which any non-Symbol objects in *symbols* have + been replaced with generic Dummy symbols and d is a dictionary + that can be used to restore the original expressions. + + Examples + ======== + + >>> from sympy.solvers.solvers import recast_to_symbols + >>> from sympy import symbols, Function + >>> x, y = symbols('x y') + >>> fx = Function('f')(x) + >>> eqs, syms = [fx + 1, x, y], [fx, y] + >>> e, s, d = recast_to_symbols(eqs, syms); (e, s, d) + ([_X0 + 1, x, y], [_X0, y], {_X0: f(x)}) + + The original equations and symbols can be restored using d: + + >>> assert [i.xreplace(d) for i in eqs] == eqs + >>> assert [d.get(i, i) for i in s] == syms + + """ + if not iterable(eqs) and iterable(symbols): + raise ValueError('Both eqs and symbols must be iterable') + orig = list(symbols) + symbols = list(ordered(symbols)) + swap_sym = {} + i = 0 + for s in symbols: + if not isinstance(s, Symbol) and s not in swap_sym: + swap_sym[s] = Dummy('X%d' % i) + i += 1 + new_f = [] + for i in eqs: + isubs = getattr(i, 'subs', None) + if isubs is not None: + new_f.append(isubs(swap_sym)) + else: + new_f.append(i) + restore = {v: k for k, v in swap_sym.items()} + return new_f, [swap_sym.get(i, i) for i in orig], restore + + +def _ispow(e): + """Return True if e is a Pow or is exp.""" + return isinstance(e, Expr) and (e.is_Pow or isinstance(e, exp)) + + +def _simple_dens(f, symbols): + # when checking if a denominator is zero, we can just check the + # base of powers with nonzero exponents since if the base is zero + # the power will be zero, too. To keep it simple and fast, we + # limit simplification to exponents that are Numbers + dens = set() + for d in denoms(f, symbols): + if d.is_Pow and d.exp.is_Number: + if d.exp.is_zero: + continue # foo**0 is never 0 + d = d.base + dens.add(d) + return dens + + +def denoms(eq, *symbols): + """ + Return (recursively) set of all denominators that appear in *eq* + that contain any symbol in *symbols*; if *symbols* are not + provided then all denominators will be returned. + + Examples + ======== + + >>> from sympy.solvers.solvers import denoms + >>> from sympy.abc import x, y, z + + >>> denoms(x/y) + {y} + + >>> denoms(x/(y*z)) + {y, z} + + >>> denoms(3/x + y/z) + {x, z} + + >>> denoms(x/2 + y/z) + {2, z} + + If *symbols* are provided then only denominators containing + those symbols will be returned: + + >>> denoms(1/x + 1/y + 1/z, y, z) + {y, z} + + """ + + pot = preorder_traversal(eq) + dens = set() + for p in pot: + # Here p might be Tuple or Relational + # Expr subtrees (e.g. lhs and rhs) will be traversed after by pot + if not isinstance(p, Expr): + continue + den = denom(p) + if den is S.One: + continue + dens.update(Mul.make_args(den)) + if not symbols: + return dens + elif len(symbols) == 1: + if iterable(symbols[0]): + symbols = symbols[0] + return {d for d in dens if any(s in d.free_symbols for s in symbols)} + + +def checksol(f, symbol, sol=None, **flags): + """ + Checks whether sol is a solution of equation f == 0. + + Explanation + =========== + + Input can be either a single symbol and corresponding value + or a dictionary of symbols and values. When given as a dictionary + and flag ``simplify=True``, the values in the dictionary will be + simplified. *f* can be a single equation or an iterable of equations. + A solution must satisfy all equations in *f* to be considered valid; + if a solution does not satisfy any equation, False is returned; if one or + more checks are inconclusive (and none are False) then None is returned. + + Examples + ======== + + >>> from sympy import checksol, symbols + >>> x, y = symbols('x,y') + >>> checksol(x**4 - 1, x, 1) + True + >>> checksol(x**4 - 1, x, 0) + False + >>> checksol(x**2 + y**2 - 5**2, {x: 3, y: 4}) + True + + To check if an expression is zero using ``checksol()``, pass it + as *f* and send an empty dictionary for *symbol*: + + >>> checksol(x**2 + x - x*(x + 1), {}) + True + + None is returned if ``checksol()`` could not conclude. + + flags: + 'numerical=True (default)' + do a fast numerical check if ``f`` has only one symbol. + 'minimal=True (default is False)' + a very fast, minimal testing. + 'warn=True (default is False)' + show a warning if checksol() could not conclude. + 'simplify=True (default)' + simplify solution before substituting into function and + simplify the function before trying specific simplifications + 'force=True (default is False)' + make positive all symbols without assumptions regarding sign. + + """ + from sympy.physics.units import Unit + + minimal = flags.get('minimal', False) + + if sol is not None: + sol = {symbol: sol} + elif isinstance(symbol, dict): + sol = symbol + else: + msg = 'Expecting (sym, val) or ({sym: val}, None) but got (%s, %s)' + raise ValueError(msg % (symbol, sol)) + + if iterable(f): + if not f: + raise ValueError('no functions to check') + return fuzzy_and(checksol(fi, sol, **flags) for fi in f) + + f = _sympify(f) + + if f.is_number: + return f.is_zero + + if isinstance(f, Poly): + f = f.as_expr() + elif isinstance(f, (Eq, Ne)): + if f.rhs in (S.true, S.false): + f = f.reversed + B, E = f.args + if isinstance(B, BooleanAtom): + f = f.subs(sol) + if not f.is_Boolean: + return + elif isinstance(f, Eq): + f = Add(f.lhs, -f.rhs, evaluate=False) + + if isinstance(f, BooleanAtom): + return bool(f) + elif not f.is_Relational and not f: + return True + + illegal = set(_illegal) + if any(sympify(v).atoms() & illegal for k, v in sol.items()): + return False + + attempt = -1 + numerical = flags.get('numerical', True) + while 1: + attempt += 1 + if attempt == 0: + val = f.subs(sol) + if isinstance(val, Mul): + val = val.as_independent(Unit)[0] + if val.atoms() & illegal: + return False + elif attempt == 1: + if not val.is_number: + if not val.is_constant(*list(sol.keys()), simplify=not minimal): + return False + # there are free symbols -- simple expansion might work + _, val = val.as_content_primitive() + val = _mexpand(val.as_numer_denom()[0], recursive=True) + elif attempt == 2: + if minimal: + return + if flags.get('simplify', True): + for k in sol: + sol[k] = simplify(sol[k]) + # start over without the failed expanded form, possibly + # with a simplified solution + val = simplify(f.subs(sol)) + if flags.get('force', True): + val, reps = posify(val) + # expansion may work now, so try again and check + exval = _mexpand(val, recursive=True) + if exval.is_number: + # we can decide now + val = exval + else: + # if there are no radicals and no functions then this can't be + # zero anymore -- can it? + pot = preorder_traversal(expand_mul(val)) + seen = set() + saw_pow_func = False + for p in pot: + if p in seen: + continue + seen.add(p) + if p.is_Pow and not p.exp.is_Integer: + saw_pow_func = True + elif p.is_Function: + saw_pow_func = True + elif isinstance(p, UndefinedFunction): + saw_pow_func = True + if saw_pow_func: + break + if saw_pow_func is False: + return False + if flags.get('force', True): + # don't do a zero check with the positive assumptions in place + val = val.subs(reps) + nz = fuzzy_not(val.is_zero) + if nz is not None: + # issue 5673: nz may be True even when False + # so these are just hacks to keep a false positive + # from being returned + + # HACK 1: LambertW (issue 5673) + if val.is_number and val.has(LambertW): + # don't eval this to verify solution since if we got here, + # numerical must be False + return None + + # add other HACKs here if necessary, otherwise we assume + # the nz value is correct + return not nz + break + if val.is_Rational: + return val == 0 + if numerical and val.is_number: + return (abs(val.n(18).n(12, chop=True)) < 1e-9) is S.true + + if flags.get('warn', False): + warnings.warn("\n\tWarning: could not verify solution %s." % sol) + # returns None if it can't conclude + # TODO: improve solution testing + + +def solve(f, *symbols, **flags): + r""" + Algebraically solves equations and systems of equations. + + Explanation + =========== + + Currently supported: + - polynomial + - transcendental + - piecewise combinations of the above + - systems of linear and polynomial equations + - systems containing relational expressions + - systems implied by undetermined coefficients + + Examples + ======== + + The default output varies according to the input and might + be a list (possibly empty), a dictionary, a list of + dictionaries or tuples, or an expression involving relationals. + For specifics regarding different forms of output that may appear, see :ref:`solve_output`. + Let it suffice here to say that to obtain a uniform output from + `solve` use ``dict=True`` or ``set=True`` (see below). + + >>> from sympy import solve, Poly, Eq, Matrix, Symbol + >>> from sympy.abc import x, y, z, a, b + + The expressions that are passed can be Expr, Equality, or Poly + classes (or lists of the same); a Matrix is considered to be a + list of all the elements of the matrix: + + >>> solve(x - 3, x) + [3] + >>> solve(Eq(x, 3), x) + [3] + >>> solve(Poly(x - 3), x) + [3] + >>> solve(Matrix([[x, x + y]]), x, y) == solve([x, x + y], x, y) + True + + If no symbols are indicated to be of interest and the equation is + univariate, a list of values is returned; otherwise, the keys in + a dictionary will indicate which (of all the variables used in + the expression(s)) variables and solutions were found: + + >>> solve(x**2 - 4) + [-2, 2] + >>> solve((x - a)*(y - b)) + [{a: x}, {b: y}] + >>> solve([x - 3, y - 1]) + {x: 3, y: 1} + >>> solve([x - 3, y**2 - 1]) + [{x: 3, y: -1}, {x: 3, y: 1}] + + If you pass symbols for which solutions are sought, the output will vary + depending on the number of symbols you passed, whether you are passing + a list of expressions or not, and whether a linear system was solved. + Uniform output is attained by using ``dict=True`` or ``set=True``. + + >>> #### *** feel free to skip to the stars below *** #### + >>> from sympy import TableForm + >>> h = [None, ';|;'.join(['e', 's', 'solve(e, s)', 'solve(e, s, dict=True)', + ... 'solve(e, s, set=True)']).split(';')] + >>> t = [] + >>> for e, s in [ + ... (x - y, y), + ... (x - y, [x, y]), + ... (x**2 - y, [x, y]), + ... ([x - 3, y -1], [x, y]), + ... ]: + ... how = [{}, dict(dict=True), dict(set=True)] + ... res = [solve(e, s, **f) for f in how] + ... t.append([e, '|', s, '|'] + [res[0], '|', res[1], '|', res[2]]) + ... + >>> # ******************************************************* # + >>> TableForm(t, headings=h, alignments="<") + e | s | solve(e, s) | solve(e, s, dict=True) | solve(e, s, set=True) + --------------------------------------------------------------------------------------- + x - y | y | [x] | [{y: x}] | ([y], {(x,)}) + x - y | [x, y] | [(y, y)] | [{x: y}] | ([x, y], {(y, y)}) + x**2 - y | [x, y] | [(x, x**2)] | [{y: x**2}] | ([x, y], {(x, x**2)}) + [x - 3, y - 1] | [x, y] | {x: 3, y: 1} | [{x: 3, y: 1}] | ([x, y], {(3, 1)}) + + * If any equation does not depend on the symbol(s) given, it will be + eliminated from the equation set and an answer may be given + implicitly in terms of variables that were not of interest: + + >>> solve([x - y, y - 3], x) + {x: y} + + When you pass all but one of the free symbols, an attempt + is made to find a single solution based on the method of + undetermined coefficients. If it succeeds, a dictionary of values + is returned. If you want an algebraic solutions for one + or more of the symbols, pass the expression to be solved in a list: + + >>> e = a*x + b - 2*x - 3 + >>> solve(e, [a, b]) + {a: 2, b: 3} + >>> solve([e], [a, b]) + {a: -b/x + (2*x + 3)/x} + + When there is no solution for any given symbol which will make all + expressions zero, the empty list is returned (or an empty set in + the tuple when ``set=True``): + + >>> from sympy import sqrt + >>> solve(3, x) + [] + >>> solve(x - 3, y) + [] + >>> solve(sqrt(x) + 1, x, set=True) + ([x], set()) + + When an object other than a Symbol is given as a symbol, it is + isolated algebraically and an implicit solution may be obtained. + This is mostly provided as a convenience to save you from replacing + the object with a Symbol and solving for that Symbol. It will only + work if the specified object can be replaced with a Symbol using the + subs method: + + >>> from sympy import exp, Function + >>> f = Function('f') + + >>> solve(f(x) - x, f(x)) + [x] + >>> solve(f(x).diff(x) - f(x) - x, f(x).diff(x)) + [x + f(x)] + >>> solve(f(x).diff(x) - f(x) - x, f(x)) + [-x + Derivative(f(x), x)] + >>> solve(x + exp(x)**2, exp(x), set=True) + ([exp(x)], {(-sqrt(-x),), (sqrt(-x),)}) + + >>> from sympy import Indexed, IndexedBase, Tuple + >>> A = IndexedBase('A') + >>> eqs = Tuple(A[1] + A[2] - 3, A[1] - A[2] + 1) + >>> solve(eqs, eqs.atoms(Indexed)) + {A[1]: 1, A[2]: 2} + + * To solve for a function within a derivative, use :func:`~.dsolve`. + + To solve for a symbol implicitly, use implicit=True: + + >>> solve(x + exp(x), x) + [-LambertW(1)] + >>> solve(x + exp(x), x, implicit=True) + [-exp(x)] + + It is possible to solve for anything in an expression that can be + replaced with a symbol using :obj:`~sympy.core.basic.Basic.subs`: + + >>> solve(x + 2 + sqrt(3), x + 2) + [-sqrt(3)] + >>> solve((x + 2 + sqrt(3), x + 4 + y), y, x + 2) + {y: -2 + sqrt(3), x + 2: -sqrt(3)} + + * Nothing heroic is done in this implicit solving so you may end up + with a symbol still in the solution: + + >>> eqs = (x*y + 3*y + sqrt(3), x + 4 + y) + >>> solve(eqs, y, x + 2) + {y: -sqrt(3)/(x + 3), x + 2: -2*x/(x + 3) - 6/(x + 3) + sqrt(3)/(x + 3)} + >>> solve(eqs, y*x, x) + {x: -y - 4, x*y: -3*y - sqrt(3)} + + * If you attempt to solve for a number, remember that the number + you have obtained does not necessarily mean that the value is + equivalent to the expression obtained: + + >>> solve(sqrt(2) - 1, 1) + [sqrt(2)] + >>> solve(x - y + 1, 1) # /!\ -1 is targeted, too + [x/(y - 1)] + >>> [_.subs(z, -1) for _ in solve((x - y + 1).subs(-1, z), 1)] + [-x + y] + + **Additional Examples** + + ``solve()`` with check=True (default) will run through the symbol tags to + eliminate unwanted solutions. If no assumptions are included, all possible + solutions will be returned: + + >>> x = Symbol("x") + >>> solve(x**2 - 1) + [-1, 1] + + By setting the ``positive`` flag, only one solution will be returned: + + >>> pos = Symbol("pos", positive=True) + >>> solve(pos**2 - 1) + [1] + + When the solutions are checked, those that make any denominator zero + are automatically excluded. If you do not want to exclude such solutions, + then use the check=False option: + + >>> from sympy import sin, limit + >>> solve(sin(x)/x) # 0 is excluded + [pi] + + If ``check=False``, then a solution to the numerator being zero is found + but the value of $x = 0$ is a spurious solution since $\sin(x)/x$ has the well + known limit (without discontinuity) of 1 at $x = 0$: + + >>> solve(sin(x)/x, check=False) + [0, pi] + + In the following case, however, the limit exists and is equal to the + value of $x = 0$ that is excluded when check=True: + + >>> eq = x**2*(1/x - z**2/x) + >>> solve(eq, x) + [] + >>> solve(eq, x, check=False) + [0] + >>> limit(eq, x, 0, '-') + 0 + >>> limit(eq, x, 0, '+') + 0 + + **Solving Relationships** + + When one or more expressions passed to ``solve`` is a relational, + a relational result is returned (and the ``dict`` and ``set`` flags + are ignored): + + >>> solve(x < 3) + (-oo < x) & (x < 3) + >>> solve([x < 3, x**2 > 4], x) + ((-oo < x) & (x < -2)) | ((2 < x) & (x < 3)) + >>> solve([x + y - 3, x > 3], x) + (3 < x) & (x < oo) & Eq(x, 3 - y) + + Although checking of assumptions on symbols in relationals + is not done, setting assumptions will affect how certain + relationals might automatically simplify: + + >>> solve(x**2 > 4) + ((-oo < x) & (x < -2)) | ((2 < x) & (x < oo)) + + >>> r = Symbol('r', real=True) + >>> solve(r**2 > 4) + (2 < r) | (r < -2) + + There is currently no algorithm in SymPy that allows you to use + relationships to resolve more than one variable. So the following + does not determine that ``q < 0`` (and trying to solve for ``r`` + and ``q`` will raise an error): + + >>> from sympy import symbols + >>> r, q = symbols('r, q', real=True) + >>> solve([r + q - 3, r > 3], r) + (3 < r) & Eq(r, 3 - q) + + You can directly call the routine that ``solve`` calls + when it encounters a relational: :func:`~.reduce_inequalities`. + It treats Expr like Equality. + + >>> from sympy import reduce_inequalities + >>> reduce_inequalities([x**2 - 4]) + Eq(x, -2) | Eq(x, 2) + + If each relationship contains only one symbol of interest, + the expressions can be processed for multiple symbols: + + >>> reduce_inequalities([0 <= x - 1, y < 3], [x, y]) + (-oo < y) & (1 <= x) & (x < oo) & (y < 3) + + But an error is raised if any relationship has more than one + symbol of interest: + + >>> reduce_inequalities([0 <= x*y - 1, y < 3], [x, y]) + Traceback (most recent call last): + ... + NotImplementedError: + inequality has more than one symbol of interest. + + **Disabling High-Order Explicit Solutions** + + When solving polynomial expressions, you might not want explicit solutions + (which can be quite long). If the expression is univariate, ``CRootOf`` + instances will be returned instead: + + >>> solve(x**3 - x + 1) + [-1/((-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)) - + (-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3, + -(-1/2 + sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3 - + 1/((-1/2 + sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)), + -(3*sqrt(69)/2 + 27/2)**(1/3)/3 - + 1/(3*sqrt(69)/2 + 27/2)**(1/3)] + >>> solve(x**3 - x + 1, cubics=False) + [CRootOf(x**3 - x + 1, 0), + CRootOf(x**3 - x + 1, 1), + CRootOf(x**3 - x + 1, 2)] + + If the expression is multivariate, no solution might be returned: + + >>> solve(x**3 - x + a, x, cubics=False) + [] + + Sometimes solutions will be obtained even when a flag is False because the + expression could be factored. In the following example, the equation can + be factored as the product of a linear and a quadratic factor so explicit + solutions (which did not require solving a cubic expression) are obtained: + + >>> eq = x**3 + 3*x**2 + x - 1 + >>> solve(eq, cubics=False) + [-1, -1 + sqrt(2), -sqrt(2) - 1] + + **Solving Equations Involving Radicals** + + Because of SymPy's use of the principle root, some solutions + to radical equations will be missed unless check=False: + + >>> from sympy import root + >>> eq = root(x**3 - 3*x**2, 3) + 1 - x + >>> solve(eq) + [] + >>> solve(eq, check=False) + [1/3] + + In the above example, there is only a single solution to the + equation. Other expressions will yield spurious roots which + must be checked manually; roots which give a negative argument + to odd-powered radicals will also need special checking: + + >>> from sympy import real_root, S + >>> eq = root(x, 3) - root(x, 5) + S(1)/7 + >>> solve(eq) # this gives 2 solutions but misses a 3rd + [CRootOf(7*x**5 - 7*x**3 + 1, 1)**15, + CRootOf(7*x**5 - 7*x**3 + 1, 2)**15] + >>> sol = solve(eq, check=False) + >>> [abs(eq.subs(x,i).n(2)) for i in sol] + [0.48, 0.e-110, 0.e-110, 0.052, 0.052] + + The first solution is negative so ``real_root`` must be used to see that it + satisfies the expression: + + >>> abs(real_root(eq.subs(x, sol[0])).n(2)) + 0.e-110 + + If the roots of the equation are not real then more care will be + necessary to find the roots, especially for higher order equations. + Consider the following expression: + + >>> expr = root(x, 3) - root(x, 5) + + We will construct a known value for this expression at x = 3 by selecting + the 1-th root for each radical: + + >>> expr1 = root(x, 3, 1) - root(x, 5, 1) + >>> v = expr1.subs(x, -3) + + The ``solve`` function is unable to find any exact roots to this equation: + + >>> eq = Eq(expr, v); eq1 = Eq(expr1, v) + >>> solve(eq, check=False), solve(eq1, check=False) + ([], []) + + The function ``unrad``, however, can be used to get a form of the equation + for which numerical roots can be found: + + >>> from sympy.solvers.solvers import unrad + >>> from sympy import nroots + >>> e, (p, cov) = unrad(eq) + >>> pvals = nroots(e) + >>> inversion = solve(cov, x)[0] + >>> xvals = [inversion.subs(p, i) for i in pvals] + + Although ``eq`` or ``eq1`` could have been used to find ``xvals``, the + solution can only be verified with ``expr1``: + + >>> z = expr - v + >>> [xi.n(chop=1e-9) for xi in xvals if abs(z.subs(x, xi).n()) < 1e-9] + [] + >>> z1 = expr1 - v + >>> [xi.n(chop=1e-9) for xi in xvals if abs(z1.subs(x, xi).n()) < 1e-9] + [-3.0] + + Parameters + ========== + + f : + - a single Expr or Poly that must be zero + - an Equality + - a Relational expression + - a Boolean + - iterable of one or more of the above + + symbols : (object(s) to solve for) specified as + - none given (other non-numeric objects will be used) + - single symbol + - denested list of symbols + (e.g., ``solve(f, x, y)``) + - ordered iterable of symbols + (e.g., ``solve(f, [x, y])``) + + flags : + dict=True (default is False) + Return list (perhaps empty) of solution mappings. + set=True (default is False) + Return list of symbols and set of tuple(s) of solution(s). + exclude=[] (default) + Do not try to solve for any of the free symbols in exclude; + if expressions are given, the free symbols in them will + be extracted automatically. + check=True (default) + If False, do not do any testing of solutions. This can be + useful if you want to include solutions that make any + denominator zero. + numerical=True (default) + Do a fast numerical check if *f* has only one symbol. + minimal=True (default is False) + A very fast, minimal testing. + warn=True (default is False) + Show a warning if ``checksol()`` could not conclude. + simplify=True (default) + Simplify all but polynomials of order 3 or greater before + returning them and (if check is not False) use the + general simplify function on the solutions and the + expression obtained when they are substituted into the + function which should be zero. + force=True (default is False) + Make positive all symbols without assumptions regarding sign. + rational=True (default) + Recast Floats as Rational; if this option is not used, the + system containing Floats may fail to solve because of issues + with polys. If rational=None, Floats will be recast as + rationals but the answer will be recast as Floats. If the + flag is False then nothing will be done to the Floats. + manual=True (default is False) + Do not use the polys/matrix method to solve a system of + equations, solve them one at a time as you might "manually." + implicit=True (default is False) + Allows ``solve`` to return a solution for a pattern in terms of + other functions that contain that pattern; this is only + needed if the pattern is inside of some invertible function + like cos, exp, etc. + particular=True (default is False) + Instructs ``solve`` to try to find a particular solution to + a linear system with as many zeros as possible; this is very + expensive. + quick=True (default is False; ``particular`` must be True) + Selects a fast heuristic to find a solution with many zeros + whereas a value of False uses the very slow method guaranteed + to find the largest number of zeros possible. + cubics=True (default) + Return explicit solutions when cubic expressions are encountered. + When False, quartics and quintics are disabled, too. + quartics=True (default) + Return explicit solutions when quartic expressions are encountered. + When False, quintics are disabled, too. + quintics=True (default) + Return explicit solutions (if possible) when quintic expressions + are encountered. + + See Also + ======== + + rsolve: For solving recurrence relationships + sympy.solvers.ode.dsolve: For solving differential equations + + """ + from .inequalities import reduce_inequalities + + # checking/recording flags + ########################################################################### + + # set solver types explicitly; as soon as one is False + # all the rest will be False + hints = ('cubics', 'quartics', 'quintics') + default = True + for k in hints: + default = flags.setdefault(k, bool(flags.get(k, default))) + + # allow solution to contain symbol if True: + implicit = flags.get('implicit', False) + + # record desire to see warnings + warn = flags.get('warn', False) + + # this flag will be needed for quick exits below, so record + # now -- but don't record `dict` yet since it might change + as_set = flags.get('set', False) + + # keeping track of how f was passed + bare_f = not iterable(f) + + # check flag usage for particular/quick which should only be used + # with systems of equations + if flags.get('quick', None) is not None: + if not flags.get('particular', None): + raise ValueError('when using `quick`, `particular` should be True') + if flags.get('particular', False) and bare_f: + raise ValueError(filldedent(""" + The 'particular/quick' flag is usually used with systems of + equations. Either pass your equation in a list or + consider using a solver like `diophantine` if you are + looking for a solution in integers.""")) + + # sympify everything, creating list of expressions and list of symbols + ########################################################################### + + def _sympified_list(w): + return list(map(sympify, w if iterable(w) else [w])) + f, symbols = (_sympified_list(w) for w in [f, symbols]) + + # preprocess symbol(s) + ########################################################################### + + ordered_symbols = None # were the symbols in a well defined order? + if not symbols: + # get symbols from equations + symbols = set().union(*[fi.free_symbols for fi in f]) + if len(symbols) < len(f): + for fi in f: + pot = preorder_traversal(fi) + for p in pot: + if isinstance(p, AppliedUndef): + if not as_set: + flags['dict'] = True # better show symbols + symbols.add(p) + pot.skip() # don't go any deeper + ordered_symbols = False + symbols = list(ordered(symbols)) # to make it canonical + else: + if len(symbols) == 1 and iterable(symbols[0]): + symbols = symbols[0] + ordered_symbols = symbols and is_sequence(symbols, + include=GeneratorType) + _symbols = list(uniq(symbols)) + if len(_symbols) != len(symbols): + ordered_symbols = False + symbols = list(ordered(symbols)) + else: + symbols = _symbols + + # check for duplicates + if len(symbols) != len(set(symbols)): + raise ValueError('duplicate symbols given') + # remove those not of interest + exclude = flags.pop('exclude', set()) + if exclude: + if isinstance(exclude, Expr): + exclude = [exclude] + exclude = set().union(*[e.free_symbols for e in sympify(exclude)]) + symbols = [s for s in symbols if s not in exclude] + + # preprocess equation(s) + ########################################################################### + + # automatically ignore True values + if isinstance(f, list): + f = [s for s in f if s is not S.true] + + # handle canonicalization of equation types + for i, fi in enumerate(f): + if isinstance(fi, (Eq, Ne)): + if 'ImmutableDenseMatrix' in [type(a).__name__ for a in fi.args]: + fi = fi.lhs - fi.rhs + else: + L, R = fi.args + if isinstance(R, BooleanAtom): + L, R = R, L + if isinstance(L, BooleanAtom): + if isinstance(fi, Ne): + L = ~L + if R.is_Relational: + fi = ~R if L is S.false else R + elif R.is_Symbol: + return L + elif R.is_Boolean and (~R).is_Symbol: + return ~L + else: + raise NotImplementedError(filldedent(''' + Unanticipated argument of Eq when other arg + is True or False. + ''')) + elif isinstance(fi, Eq): + fi = Add(fi.lhs, -fi.rhs, evaluate=False) + f[i] = fi + + # *** dispatch and handle as a system of relationals + # ************************************************** + if fi.is_Relational: + if len(symbols) != 1: + raise ValueError("can only solve for one symbol at a time") + if warn and symbols[0].assumptions0: + warnings.warn(filldedent(""" + \tWarning: assumptions about variable '%s' are + not handled currently.""" % symbols[0])) + return reduce_inequalities(f, symbols=symbols) + + # convert Poly to expression + if isinstance(fi, Poly): + f[i] = fi.as_expr() + + # rewrite hyperbolics in terms of exp if they have symbols of + # interest + f[i] = f[i].replace(lambda w: isinstance(w, HyperbolicFunction) and \ + w.has_free(*symbols), lambda w: w.rewrite(exp)) + + # if we have a Matrix, we need to iterate over its elements again + if f[i].is_Matrix: + try: + f[i] = f[i].as_explicit() + except ValueError: + raise ValueError( + "solve cannot handle matrices with symbolic shape." + ) + bare_f = False + f.extend(list(f[i])) + f[i] = S.Zero + + # if we can split it into real and imaginary parts then do so + freei = f[i].free_symbols + if freei and all(s.is_extended_real or s.is_imaginary for s in freei): + fr, fi = f[i].as_real_imag() + # accept as long as new re, im, arg or atan2 are not introduced + had = f[i].atoms(re, im, arg, atan2) + if fr and fi and fr != fi and not any( + i.atoms(re, im, arg, atan2) - had for i in (fr, fi)): + if bare_f: + bare_f = False + f[i: i + 1] = [fr, fi] + + # real/imag handling ----------------------------- + if any(isinstance(fi, (bool, BooleanAtom)) for fi in f): + if as_set: + return [], set() + return [] + + for i, fi in enumerate(f): + # Abs + while True: + was = fi + fi = fi.replace(Abs, lambda arg: + separatevars(Abs(arg)).rewrite(Piecewise) if arg.has(*symbols) + else Abs(arg)) + if was == fi: + break + + for e in fi.find(Abs): + if e.has(*symbols): + raise NotImplementedError('solving %s when the argument ' + 'is not real or imaginary.' % e) + + # arg + fi = fi.replace(arg, lambda a: arg(a).rewrite(atan2).rewrite(atan)) + + # save changes + f[i] = fi + + # see if re(s) or im(s) appear + freim = [fi for fi in f if fi.has(re, im)] + if freim: + irf = [] + for s in symbols: + if s.is_real or s.is_imaginary: + continue # neither re(x) nor im(x) will appear + # if re(s) or im(s) appear, the auxiliary equation must be present + if any(fi.has(re(s), im(s)) for fi in freim): + irf.append((s, re(s) + S.ImaginaryUnit*im(s))) + if irf: + for s, rhs in irf: + f = [fi.xreplace({s: rhs}) for fi in f] + [s - rhs] + symbols.extend([re(s), im(s)]) + if bare_f: + bare_f = False + flags['dict'] = True + # end of real/imag handling ----------------------------- + + # we can solve for non-symbol entities by replacing them with Dummy symbols + f, symbols, swap_sym = recast_to_symbols(f, symbols) + # this set of symbols (perhaps recast) is needed below + symset = set(symbols) + + # get rid of equations that have no symbols of interest; we don't + # try to solve them because the user didn't ask and they might be + # hard to solve; this means that solutions may be given in terms + # of the eliminated equations e.g. solve((x-y, y-3), x) -> {x: y} + newf = [] + for fi in f: + # let the solver handle equations that.. + # - have no symbols but are expressions + # - have symbols of interest + # - have no symbols of interest but are constant + # but when an expression is not constant and has no symbols of + # interest, it can't change what we obtain for a solution from + # the remaining equations so we don't include it; and if it's + # zero it can be removed and if it's not zero, there is no + # solution for the equation set as a whole + # + # The reason for doing this filtering is to allow an answer + # to be obtained to queries like solve((x - y, y), x); without + # this mod the return value is [] + ok = False + if fi.free_symbols & symset: + ok = True + else: + if fi.is_number: + if fi.is_Number: + if fi.is_zero: + continue + return [] + ok = True + else: + if fi.is_constant(): + ok = True + if ok: + newf.append(fi) + if not newf: + if as_set: + return symbols, set() + return [] + f = newf + del newf + + # mask off any Object that we aren't going to invert: Derivative, + # Integral, etc... so that solving for anything that they contain will + # give an implicit solution + seen = set() + non_inverts = set() + for fi in f: + pot = preorder_traversal(fi) + for p in pot: + if not isinstance(p, Expr) or isinstance(p, Piecewise): + pass + elif (isinstance(p, bool) or + not p.args or + p in symset or + p.is_Add or p.is_Mul or + p.is_Pow and not implicit or + p.is_Function and not implicit) and p.func not in (re, im): + continue + elif p not in seen: + seen.add(p) + if p.free_symbols & symset: + non_inverts.add(p) + else: + continue + pot.skip() + del seen + non_inverts = dict(list(zip(non_inverts, [Dummy() for _ in non_inverts]))) + f = [fi.subs(non_inverts) for fi in f] + + # Both xreplace and subs are needed below: xreplace to force substitution + # inside Derivative, subs to handle non-straightforward substitutions + non_inverts = [(v, k.xreplace(swap_sym).subs(swap_sym)) for k, v in non_inverts.items()] + + # rationalize Floats + floats = False + if flags.get('rational', True) is not False: + for i, fi in enumerate(f): + if fi.has(Float): + floats = True + f[i] = nsimplify(fi, rational=True) + + # capture any denominators before rewriting since + # they may disappear after the rewrite, e.g. issue 14779 + flags['_denominators'] = _simple_dens(f[0], symbols) + + # Any embedded piecewise functions need to be brought out to the + # top level so that the appropriate strategy gets selected. + # However, this is necessary only if one of the piecewise + # functions depends on one of the symbols we are solving for. + def _has_piecewise(e): + if e.is_Piecewise: + return e.has(*symbols) + return any(_has_piecewise(a) for a in e.args) + for i, fi in enumerate(f): + if _has_piecewise(fi): + f[i] = piecewise_fold(fi) + + # expand angles of sums; in general, expand_trig will allow + # more roots to be found but this is not a great solultion + # to not returning a parametric solution, otherwise + # many values can be returned that have a simple + # relationship between values + targs = {t for fi in f for t in fi.atoms(TrigonometricFunction)} + if len(targs) > 1: + add, other = sift(targs, lambda x: x.args[0].is_Add, binary=True) + add, other = [[i for i in l if i.has_free(*symbols)] for l in (add, other)] + trep = {} + for t in add: + a = t.args[0] + ind, dep = a.as_independent(*symbols) + if dep in symbols or -dep in symbols: + # don't let expansion expand wrt anything in ind + n = Dummy() if not ind.is_Number else ind + trep[t] = TR10(t.func(dep + n)).xreplace({n: ind}) + if other and len(other) <= 2: + base = gcd(*[i.args[0] for i in other]) if len(other) > 1 else other[0].args[0] + for i in other: + trep[i] = TR11(i, base) + f = [fi.xreplace(trep) for fi in f] + + # + # try to get a solution + ########################################################################### + if bare_f: + solution = None + if len(symbols) != 1: + solution = _solve_undetermined(f[0], symbols, flags) + if not solution: + solution = _solve(f[0], *symbols, **flags) + else: + linear, solution = _solve_system(f, symbols, **flags) + assert type(solution) is list + assert not solution or type(solution[0]) is dict, solution + # + # postprocessing + ########################################################################### + # capture as_dict flag now (as_set already captured) + as_dict = flags.get('dict', False) + + # define how solution will get unpacked + tuple_format = lambda s: [tuple([i.get(x, x) for x in symbols]) for i in s] + if as_dict or as_set: + unpack = None + elif bare_f: + if len(symbols) == 1: + unpack = lambda s: [i[symbols[0]] for i in s] + elif len(solution) == 1 and len(solution[0]) == len(symbols): + # undetermined linear coeffs solution + unpack = lambda s: s[0] + elif ordered_symbols: + unpack = tuple_format + else: + unpack = lambda s: s + else: + if solution: + if linear and len(solution) == 1: + # if you want the tuple solution for the linear + # case, use `set=True` + unpack = lambda s: s[0] + elif ordered_symbols: + unpack = tuple_format + else: + unpack = lambda s: s + else: + unpack = None + + # Restore masked-off objects + if non_inverts and type(solution) is list: + solution = [{k: v.subs(non_inverts) for k, v in s.items()} + for s in solution] + + # Restore original "symbols" if a dictionary is returned. + # This is not necessary for + # - the single univariate equation case + # since the symbol will have been removed from the solution; + # - the nonlinear poly_system since that only supports zero-dimensional + # systems and those results come back as a list + # + # ** unless there were Derivatives with the symbols, but those were handled + # above. + if swap_sym: + symbols = [swap_sym.get(k, k) for k in symbols] + for i, sol in enumerate(solution): + solution[i] = {swap_sym.get(k, k): v.subs(swap_sym) + for k, v in sol.items()} + + # Get assumptions about symbols, to filter solutions. + # Note that if assumptions about a solution can't be verified, it is still + # returned. + check = flags.get('check', True) + + # restore floats + if floats and solution and flags.get('rational', None) is None: + solution = nfloat(solution, exponent=False) + # nfloat might reveal more duplicates + solution = _remove_duplicate_solutions(solution) + + if check and solution: # assumption checking + warn = flags.get('warn', False) + got_None = [] # solutions for which one or more symbols gave None + no_False = [] # solutions for which no symbols gave False + for sol in solution: + v = fuzzy_and(check_assumptions(val, **symb.assumptions0) + for symb, val in sol.items()) + if v is False: + continue + no_False.append(sol) + if v is None: + got_None.append(sol) + + solution = no_False + if warn and got_None: + warnings.warn(filldedent(""" + \tWarning: assumptions concerning following solution(s) + cannot be checked:""" + '\n\t' + + ', '.join(str(s) for s in got_None))) + + # + # done + ########################################################################### + + if not solution: + if as_set: + return symbols, set() + return [] + + # make orderings canonical for list of dictionaries + if not as_set: # for set, no point in ordering + solution = [{k: s[k] for k in ordered(s)} for s in solution] + solution.sort(key=default_sort_key) + + if not (as_set or as_dict): + return unpack(solution) + + if as_dict: + return solution + + # set output: (symbols, {t1, t2, ...}) from list of dictionaries; + # include all symbols for those that like a verbose solution + # and to resolve any differences in dictionary keys. + # + # The set results can easily be used to make a verbose dict as + # k, v = solve(eqs, syms, set=True) + # sol = [dict(zip(k,i)) for i in v] + # + if ordered_symbols: + k = symbols # keep preferred order + else: + # just unify the symbols for which solutions were found + k = list(ordered(set(flatten(tuple(i.keys()) for i in solution)))) + return k, {tuple([s.get(ki, ki) for ki in k]) for s in solution} + + +def _solve_undetermined(g, symbols, flags): + """solve helper to return a list with one dict (solution) else None + + A direct call to solve_undetermined_coeffs is more flexible and + can return both multiple solutions and handle more than one independent + variable. Here, we have to be more cautious to keep from solving + something that does not look like an undetermined coeffs system -- + to minimize the surprise factor since singularities that cancel are not + prohibited in solve_undetermined_coeffs. + """ + if g.free_symbols - set(symbols): + sol = solve_undetermined_coeffs(g, symbols, **dict(flags, dict=True, set=None)) + if len(sol) == 1: + return sol + + +def _solve(f, *symbols, **flags): + """Return a checked solution for *f* in terms of one or more of the + symbols in the form of a list of dictionaries. + + If no method is implemented to solve the equation, a NotImplementedError + will be raised. In the case that conversion of an expression to a Poly + gives None a ValueError will be raised. + """ + + not_impl_msg = "No algorithms are implemented to solve equation %s" + + if len(symbols) != 1: + # look for solutions for desired symbols that are independent + # of symbols already solved for, e.g. if we solve for x = y + # then no symbol having x in its solution will be returned. + + # First solve for linear symbols (since that is easier and limits + # solution size) and then proceed with symbols appearing + # in a non-linear fashion. Ideally, if one is solving a single + # expression for several symbols, they would have to be + # appear in factors of an expression, but we do not here + # attempt factorization. XXX perhaps handling a Mul + # should come first in this routine whether there is + # one or several symbols. + nonlin_s = [] + got_s = set() + rhs_s = set() + result = [] + for s in symbols: + xi, v = solve_linear(f, symbols=[s]) + if xi == s: + # no need to check but we should simplify if desired + if flags.get('simplify', True): + v = simplify(v) + vfree = v.free_symbols + if vfree & got_s: + # was linear, but has redundant relationship + # e.g. x - y = 0 has y == x is redundant for x == y + # so ignore + continue + rhs_s |= vfree + got_s.add(xi) + result.append({xi: v}) + elif xi: # there might be a non-linear solution if xi is not 0 + nonlin_s.append(s) + if not nonlin_s: + return result + for s in nonlin_s: + try: + soln = _solve(f, s, **flags) + for sol in soln: + if sol[s].free_symbols & got_s: + # depends on previously solved symbols: ignore + continue + got_s.add(s) + result.append(sol) + except NotImplementedError: + continue + if got_s: + return result + else: + raise NotImplementedError(not_impl_msg % f) + + # solve f for a single variable + + symbol = symbols[0] + + # expand binomials only if it has the unknown symbol + f = f.replace(lambda e: isinstance(e, binomial) and e.has(symbol), + lambda e: expand_func(e)) + + # checking will be done unless it is turned off before making a + # recursive call; the variables `checkdens` and `check` are + # captured here (for reference below) in case flag value changes + flags['check'] = checkdens = check = flags.pop('check', True) + + # build up solutions if f is a Mul + if f.is_Mul: + result = set() + for m in f.args: + if m in {S.NegativeInfinity, S.ComplexInfinity, S.Infinity}: + result = set() + break + soln = _vsolve(m, symbol, **flags) + result.update(set(soln)) + result = [{symbol: v} for v in result] + if check: + # all solutions have been checked but now we must + # check that the solutions do not set denominators + # in any factor to zero + dens = flags.get('_denominators', _simple_dens(f, symbols)) + result = [s for s in result if + not any(checksol(den, s, **flags) for den in + dens)] + # set flags for quick exit at end; solutions for each + # factor were already checked and simplified + check = False + flags['simplify'] = False + + elif f.is_Piecewise: + result = set() + if any(e.is_zero for e, c in f.args): + f = f.simplify() # failure imminent w/o help + + cond = neg = True + for expr, cnd in f.args: + # the explicit condition for this expr is the current cond + # and none of the previous conditions + cond = And(neg, cnd) + neg = And(neg, ~cond) + + if expr.is_zero and cond.simplify() != False: + raise NotImplementedError(filldedent(''' + An expression is already zero when %s. + This means that in this *region* the solution + is zero but solve can only represent discrete, + not interval, solutions. If this is a spurious + interval it might be resolved with simplification + of the Piecewise conditions.''' % cond)) + candidates = _vsolve(expr, symbol, **flags) + + for candidate in candidates: + if candidate in result: + # an unconditional value was already there + continue + try: + v = cond.subs(symbol, candidate) + _eval_simplify = getattr(v, '_eval_simplify', None) + if _eval_simplify is not None: + # unconditionally take the simplification of v + v = _eval_simplify(ratio=2, measure=lambda x: 1) + except TypeError: + # incompatible type with condition(s) + continue + if v == False: + continue + if v == True: + result.add(candidate) + else: + result.add(Piecewise( + (candidate, v), + (S.NaN, True))) + # solutions already checked and simplified + # **************************************** + return [{symbol: r} for r in result] + else: + # first see if it really depends on symbol and whether there + # is only a linear solution + f_num, sol = solve_linear(f, symbols=symbols) + if f_num.is_zero or sol is S.NaN: + return [] + elif f_num.is_Symbol: + # no need to check but simplify if desired + if flags.get('simplify', True): + sol = simplify(sol) + return [{f_num: sol}] + + poly = None + # check for a single Add generator + if not f_num.is_Add: + add_args = [i for i in f_num.atoms(Add) + if symbol in i.free_symbols] + if len(add_args) == 1: + gen = add_args[0] + spart = gen.as_independent(symbol)[1].as_base_exp()[0] + if spart == symbol: + try: + poly = Poly(f_num, spart) + except PolynomialError: + pass + + result = False # no solution was obtained + msg = '' # there is no failure message + + # Poly is generally robust enough to convert anything to + # a polynomial and tell us the different generators that it + # contains, so we will inspect the generators identified by + # polys to figure out what to do. + + # try to identify a single generator that will allow us to solve this + # as a polynomial, followed (perhaps) by a change of variables if the + # generator is not a symbol + + try: + if poly is None: + poly = Poly(f_num) + if poly is None: + raise ValueError('could not convert %s to Poly' % f_num) + except GeneratorsNeeded: + simplified_f = simplify(f_num) + if simplified_f != f_num: + return _solve(simplified_f, symbol, **flags) + raise ValueError('expression appears to be a constant') + + gens = [g for g in poly.gens if g.has(symbol)] + + def _as_base_q(x): + """Return (b**e, q) for x = b**(p*e/q) where p/q is the leading + Rational of the exponent of x, e.g. exp(-2*x/3) -> (exp(x), 3) + """ + b, e = x.as_base_exp() + if e.is_Rational: + return b, e.q + if not e.is_Mul: + return x, 1 + c, ee = e.as_coeff_Mul() + if c.is_Rational and c is not S.One: # c could be a Float + return b**ee, c.q + return x, 1 + + if len(gens) > 1: + # If there is more than one generator, it could be that the + # generators have the same base but different powers, e.g. + # >>> Poly(exp(x) + 1/exp(x)) + # Poly(exp(-x) + exp(x), exp(-x), exp(x), domain='ZZ') + # + # If unrad was not disabled then there should be no rational + # exponents appearing as in + # >>> Poly(sqrt(x) + sqrt(sqrt(x))) + # Poly(sqrt(x) + x**(1/4), sqrt(x), x**(1/4), domain='ZZ') + + bases, qs = list(zip(*[_as_base_q(g) for g in gens])) + bases = set(bases) + + if len(bases) > 1 or not all(q == 1 for q in qs): + funcs = {b for b in bases if b.is_Function} + + trig = {_ for _ in funcs if + isinstance(_, TrigonometricFunction)} + other = funcs - trig + if not other and len(funcs.intersection(trig)) > 1: + newf = None + if f_num.is_Add and len(f_num.args) == 2: + # check for sin(x)**p = cos(x)**p + _args = f_num.args + t = a, b = [i.atoms(Function).intersection( + trig) for i in _args] + if all(len(i) == 1 for i in t): + a, b = [i.pop() for i in t] + if isinstance(a, cos): + a, b = b, a + _args = _args[::-1] + if isinstance(a, sin) and isinstance(b, cos + ) and a.args[0] == b.args[0]: + # sin(x) + cos(x) = 0 -> tan(x) + 1 = 0 + newf, _d = (TR2i(_args[0]/_args[1]) + 1 + ).as_numer_denom() + if not _d.is_Number: + newf = None + if newf is None: + newf = TR1(f_num).rewrite(tan) + if newf != f_num: + # don't check the rewritten form --check + # solutions in the un-rewritten form below + flags['check'] = False + result = _solve(newf, symbol, **flags) + flags['check'] = check + + # just a simple case - see if replacement of single function + # clears all symbol-dependent functions, e.g. + # log(x) - log(log(x) - 1) - 3 can be solved even though it has + # two generators. + + if result is False and funcs: + funcs = list(ordered(funcs)) # put shallowest function first + f1 = funcs[0] + t = Dummy('t') + # perform the substitution + ftry = f_num.subs(f1, t) + + # if no Functions left, we can proceed with usual solve + if not ftry.has(symbol): + cv_sols = _solve(ftry, t, **flags) + cv_inv = list(ordered(_vsolve(t - f1, symbol, **flags)))[0] + result = [{symbol: cv_inv.subs(sol)} for sol in cv_sols] + + if result is False: + msg = 'multiple generators %s' % gens + + else: + # e.g. case where gens are exp(x), exp(-x) + u = bases.pop() + t = Dummy('t') + inv = _vsolve(u - t, symbol, **flags) + if isinstance(u, (Pow, exp)): + # this will be resolved by factor in _tsolve but we might + # as well try a simple expansion here to get things in + # order so something like the following will work now without + # having to factor: + # + # >>> eq = (exp(I*(-x-2))+exp(I*(x+2))) + # >>> eq.subs(exp(x),y) # fails + # exp(I*(-x - 2)) + exp(I*(x + 2)) + # >>> eq.expand().subs(exp(x),y) # works + # y**I*exp(2*I) + y**(-I)*exp(-2*I) + def _expand(p): + b, e = p.as_base_exp() + e = expand_mul(e) + return expand_power_exp(b**e) + ftry = f_num.replace( + lambda w: w.is_Pow or isinstance(w, exp), + _expand).subs(u, t) + if not ftry.has(symbol): + soln = _solve(ftry, t, **flags) + result = [{symbol: i.subs(s)} for i in inv for s in soln] + + elif len(gens) == 1: + + # There is only one generator that we are interested in, but + # there may have been more than one generator identified by + # polys (e.g. for symbols other than the one we are interested + # in) so recast the poly in terms of our generator of interest. + # Also use composite=True with f_num since Poly won't update + # poly as documented in issue 8810. + + poly = Poly(f_num, gens[0], composite=True) + + # if we aren't on the tsolve-pass, use roots + if not flags.pop('tsolve', False): + soln = None + deg = poly.degree() + flags['tsolve'] = True + hints = ('cubics', 'quartics', 'quintics') + solvers = {h: flags.get(h) for h in hints} + soln = roots(poly, **solvers) + if sum(soln.values()) < deg: + # e.g. roots(32*x**5 + 400*x**4 + 2032*x**3 + + # 5000*x**2 + 6250*x + 3189) -> {} + # so all_roots is used and RootOf instances are + # returned *unless* the system is multivariate + # or high-order EX domain. + try: + soln = poly.all_roots() + except NotImplementedError: + if not flags.get('incomplete', True): + raise NotImplementedError( + filldedent(''' + Neither high-order multivariate polynomials + nor sorting of EX-domain polynomials is supported. + If you want to see any results, pass keyword incomplete=True to + solve; to see numerical values of roots + for univariate expressions, use nroots. + ''')) + else: + pass + else: + soln = list(soln.keys()) + + if soln is not None: + u = poly.gen + if u != symbol: + try: + t = Dummy('t') + inv = _vsolve(u - t, symbol, **flags) + soln = {i.subs(t, s) for i in inv for s in soln} + except NotImplementedError: + # perhaps _tsolve can handle f_num + soln = None + else: + check = False # only dens need to be checked + if soln is not None: + if len(soln) > 2: + # if the flag wasn't set then unset it since high-order + # results are quite long. Perhaps one could base this + # decision on a certain critical length of the + # roots. In addition, wester test M2 has an expression + # whose roots can be shown to be real with the + # unsimplified form of the solution whereas only one of + # the simplified forms appears to be real. + flags['simplify'] = flags.get('simplify', False) + if soln is not None: + result = [{symbol: v} for v in soln] + + # fallback if above fails + # ----------------------- + if result is False: + # try unrad + if flags.pop('_unrad', True): + try: + u = unrad(f_num, symbol) + except (ValueError, NotImplementedError): + u = False + if u: + eq, cov = u + if cov: + isym, ieq = cov + inv = _vsolve(ieq, symbol, **flags)[0] + rv = {inv.subs(xi) for xi in _solve(eq, isym, **flags)} + else: + try: + rv = set(_vsolve(eq, symbol, **flags)) + except NotImplementedError: + rv = None + if rv is not None: + result = [{symbol: v} for v in rv] + # if the flag wasn't set then unset it since unrad results + # can be quite long or of very high order + flags['simplify'] = flags.get('simplify', False) + else: + pass # for coverage + + # try _tsolve + if result is False: + flags.pop('tsolve', None) # allow tsolve to be used on next pass + try: + soln = _tsolve(f_num, symbol, **flags) + if soln is not None: + result = [{symbol: v} for v in soln] + except PolynomialError: + pass + # ----------- end of fallback ---------------------------- + + if result is False: + raise NotImplementedError('\n'.join([msg, not_impl_msg % f])) + + result = _remove_duplicate_solutions(result) + + if flags.get('simplify', True): + result = [{k: d[k].simplify() for k in d} for d in result] + # Simplification might reveal more duplicates + result = _remove_duplicate_solutions(result) + # we just simplified the solution so we now set the flag to + # False so the simplification doesn't happen again in checksol() + flags['simplify'] = False + + if checkdens: + # reject any result that makes any denom. affirmatively 0; + # if in doubt, keep it + dens = _simple_dens(f, symbols) + result = [r for r in result if + not any(checksol(d, r, **flags) + for d in dens)] + if check: + # keep only results if the check is not False + result = [r for r in result if + checksol(f_num, r, **flags) is not False] + return result + + +def _remove_duplicate_solutions(solutions: list[dict[Expr, Expr]] + ) -> list[dict[Expr, Expr]]: + """Remove duplicates from a list of dicts""" + solutions_set = set() + solutions_new = [] + + for sol in solutions: + solset = frozenset(sol.items()) + if solset not in solutions_set: + solutions_new.append(sol) + solutions_set.add(solset) + + return solutions_new + + +def _solve_system(exprs, symbols, **flags): + """return ``(linear, solution)`` where ``linear`` is True + if the system was linear, else False; ``solution`` + is a list of dictionaries giving solutions for the symbols + """ + if not exprs: + return False, [] + + if flags.pop('_split', True): + # Split the system into connected components + V = exprs + symsset = set(symbols) + exprsyms = {e: e.free_symbols & symsset for e in exprs} + E = [] + sym_indices = {sym: i for i, sym in enumerate(symbols)} + for n, e1 in enumerate(exprs): + for e2 in exprs[:n]: + # Equations are connected if they share a symbol + if exprsyms[e1] & exprsyms[e2]: + E.append((e1, e2)) + G = V, E + subexprs = connected_components(G) + if len(subexprs) > 1: + subsols = [] + linear = True + for subexpr in subexprs: + subsyms = set() + for e in subexpr: + subsyms |= exprsyms[e] + subsyms = sorted(subsyms, key = lambda x: sym_indices[x]) + flags['_split'] = False # skip split step + _linear, subsol = _solve_system(subexpr, subsyms, **flags) + if linear: + linear = linear and _linear + if not isinstance(subsol, list): + subsol = [subsol] + subsols.append(subsol) + # Full solution is cartesian product of subsystems + sols = [] + for soldicts in product(*subsols): + sols.append(dict(item for sd in soldicts + for item in sd.items())) + return linear, sols + + polys = [] + dens = set() + failed = [] + result = [] + solved_syms = [] + linear = True + manual = flags.get('manual', False) + checkdens = check = flags.get('check', True) + + for j, g in enumerate(exprs): + dens.update(_simple_dens(g, symbols)) + i, d = _invert(g, *symbols) + if d in symbols: + if linear: + linear = solve_linear(g, 0, [d])[0] == d + g = d - i + g = g.as_numer_denom()[0] + if manual: + failed.append(g) + continue + + poly = g.as_poly(*symbols, extension=True) + + if poly is not None: + polys.append(poly) + else: + failed.append(g) + + if polys: + if all(p.is_linear for p in polys): + n, m = len(polys), len(symbols) + matrix = zeros(n, m + 1) + + for i, poly in enumerate(polys): + for monom, coeff in poly.terms(): + try: + j = monom.index(1) + matrix[i, j] = coeff + except ValueError: + matrix[i, m] = -coeff + + # returns a dictionary ({symbols: values}) or None + if flags.pop('particular', False): + result = minsolve_linear_system(matrix, *symbols, **flags) + else: + result = solve_linear_system(matrix, *symbols, **flags) + result = [result] if result else [] + if failed: + if result: + solved_syms = list(result[0].keys()) # there is only one result dict + else: + solved_syms = [] + # linear doesn't change + else: + linear = False + if len(symbols) > len(polys): + + free = set().union(*[p.free_symbols for p in polys]) + free = list(ordered(free.intersection(symbols))) + got_s = set() + result = [] + for syms in subsets(free, min(len(free), len(polys))): + try: + # returns [], None or list of tuples + res = solve_poly_system(polys, *syms) + if res: + for r in set(res): + skip = False + for r1 in r: + if got_s and any(ss in r1.free_symbols + for ss in got_s): + # sol depends on previously + # solved symbols: discard it + skip = True + if not skip: + got_s.update(syms) + result.append(dict(list(zip(syms, r)))) + except NotImplementedError: + pass + if got_s: + solved_syms = list(got_s) + else: + failed.extend([g.as_expr() for g in polys]) + else: + try: + result = solve_poly_system(polys, *symbols) + if result: + solved_syms = symbols + result = [dict(list(zip(solved_syms, r))) for r in set(result)] + except NotImplementedError: + failed.extend([g.as_expr() for g in polys]) + solved_syms = [] + + # convert None or [] to [{}] + result = result or [{}] + + if failed: + linear = False + # For each failed equation, see if we can solve for one of the + # remaining symbols from that equation. If so, we update the + # solution set and continue with the next failed equation, + # repeating until we are done or we get an equation that can't + # be solved. + def _ok_syms(e, sort=False): + rv = e.free_symbols & legal + + # Solve first for symbols that have lower degree in the equation. + # Ideally we want to solve firstly for symbols that appear linearly + # with rational coefficients e.g. if e = x*y + z then we should + # solve for z first. + def key(sym): + ep = e.as_poly(sym) + if ep is None: + complexity = (S.Infinity, S.Infinity, S.Infinity) + else: + coeff_syms = ep.LC().free_symbols + complexity = (ep.degree(), len(coeff_syms & rv), len(coeff_syms)) + return complexity + (default_sort_key(sym),) + + if sort: + rv = sorted(rv, key=key) + return rv + + legal = set(symbols) # what we are interested in + # sort so equation with the fewest potential symbols is first + u = Dummy() # used in solution checking + for eq in ordered(failed, lambda _: len(_ok_syms(_))): + newresult = [] + bad_results = [] + hit = False + for r in result: + got_s = set() + # update eq with everything that is known so far + eq2 = eq.subs(r) + # if check is True then we see if it satisfies this + # equation, otherwise we just accept it + if check and r: + b = checksol(u, u, eq2, minimal=True) + if b is not None: + # this solution is sufficient to know whether + # it is valid or not so we either accept or + # reject it, then continue + if b: + newresult.append(r) + else: + bad_results.append(r) + continue + # search for a symbol amongst those available that + # can be solved for + ok_syms = _ok_syms(eq2, sort=True) + if not ok_syms: + if r: + newresult.append(r) + break # skip as it's independent of desired symbols + for s in ok_syms: + try: + soln = _vsolve(eq2, s, **flags) + except NotImplementedError: + continue + # put each solution in r and append the now-expanded + # result in the new result list; use copy since the + # solution for s is being added in-place + for sol in soln: + if got_s and any(ss in sol.free_symbols for ss in got_s): + # sol depends on previously solved symbols: discard it + continue + rnew = r.copy() + for k, v in r.items(): + rnew[k] = v.subs(s, sol) + # and add this new solution + rnew[s] = sol + # check that it is independent of previous solutions + iset = set(rnew.items()) + for i in newresult: + if len(i) < len(iset): + # update i with what is known + i_items_updated = {(k, v.xreplace(rnew)) for k, v in i.items()} + if not i_items_updated - iset: + # this is a superset of a known solution that + # is smaller + break + else: + # keep it + newresult.append(rnew) + hit = True + got_s.add(s) + if not hit: + raise NotImplementedError('could not solve %s' % eq2) + else: + result = newresult + for b in bad_results: + if b in result: + result.remove(b) + + if not result: + return False, [] + + # rely on linear/polynomial system solvers to simplify + # XXX the following tests show that the expressions + # returned are not the same as they would be if simplify + # were applied to this: + # sympy/solvers/ode/tests/test_systems/test__classify_linear_system + # sympy/solvers/tests/test_solvers/test_issue_4886 + # so the docs should be updated to reflect that or else + # the following should be `bool(failed) or not linear` + default_simplify = bool(failed) + if flags.get('simplify', default_simplify): + for r in result: + for k in r: + r[k] = simplify(r[k]) + flags['simplify'] = False # don't need to do so in checksol now + + if checkdens: + result = [r for r in result + if not any(checksol(d, r, **flags) for d in dens)] + + if check and not linear: + result = [r for r in result + if not any(checksol(e, r, **flags) is False for e in exprs)] + + result = [r for r in result if r] + return linear, result + + +def solve_linear(lhs, rhs=0, symbols=[], exclude=[]): + r""" + Return a tuple derived from ``f = lhs - rhs`` that is one of + the following: ``(0, 1)``, ``(0, 0)``, ``(symbol, solution)``, ``(n, d)``. + + Explanation + =========== + + ``(0, 1)`` meaning that ``f`` is independent of the symbols in *symbols* + that are not in *exclude*. + + ``(0, 0)`` meaning that there is no solution to the equation amongst the + symbols given. If the first element of the tuple is not zero, then the + function is guaranteed to be dependent on a symbol in *symbols*. + + ``(symbol, solution)`` where symbol appears linearly in the numerator of + ``f``, is in *symbols* (if given), and is not in *exclude* (if given). No + simplification is done to ``f`` other than a ``mul=True`` expansion, so the + solution will correspond strictly to a unique solution. + + ``(n, d)`` where ``n`` and ``d`` are the numerator and denominator of ``f`` + when the numerator was not linear in any symbol of interest; ``n`` will + never be a symbol unless a solution for that symbol was found (in which case + the second element is the solution, not the denominator). + + Examples + ======== + + >>> from sympy import cancel, Pow + + ``f`` is independent of the symbols in *symbols* that are not in + *exclude*: + + >>> from sympy import cos, sin, solve_linear + >>> from sympy.abc import x, y, z + >>> eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0 + >>> solve_linear(eq) + (0, 1) + >>> eq = cos(x)**2 + sin(x)**2 # = 1 + >>> solve_linear(eq) + (0, 1) + >>> solve_linear(x, exclude=[x]) + (0, 1) + + The variable ``x`` appears as a linear variable in each of the + following: + + >>> solve_linear(x + y**2) + (x, -y**2) + >>> solve_linear(1/x - y**2) + (x, y**(-2)) + + When not linear in ``x`` or ``y`` then the numerator and denominator are + returned: + + >>> solve_linear(x**2/y**2 - 3) + (x**2 - 3*y**2, y**2) + + If the numerator of the expression is a symbol, then ``(0, 0)`` is + returned if the solution for that symbol would have set any + denominator to 0: + + >>> eq = 1/(1/x - 2) + >>> eq.as_numer_denom() + (x, 1 - 2*x) + >>> solve_linear(eq) + (0, 0) + + But automatic rewriting may cause a symbol in the denominator to + appear in the numerator so a solution will be returned: + + >>> (1/x)**-1 + x + >>> solve_linear((1/x)**-1) + (x, 0) + + Use an unevaluated expression to avoid this: + + >>> solve_linear(Pow(1/x, -1, evaluate=False)) + (0, 0) + + If ``x`` is allowed to cancel in the following expression, then it + appears to be linear in ``x``, but this sort of cancellation is not + done by ``solve_linear`` so the solution will always satisfy the + original expression without causing a division by zero error. + + >>> eq = x**2*(1/x - z**2/x) + >>> solve_linear(cancel(eq)) + (x, 0) + >>> solve_linear(eq) + (x**2*(1 - z**2), x) + + A list of symbols for which a solution is desired may be given: + + >>> solve_linear(x + y + z, symbols=[y]) + (y, -x - z) + + A list of symbols to ignore may also be given: + + >>> solve_linear(x + y + z, exclude=[x]) + (y, -x - z) + + (A solution for ``y`` is obtained because it is the first variable + from the canonically sorted list of symbols that had a linear + solution.) + + """ + if isinstance(lhs, Eq): + if rhs: + raise ValueError(filldedent(''' + If lhs is an Equality, rhs must be 0 but was %s''' % rhs)) + rhs = lhs.rhs + lhs = lhs.lhs + dens = None + eq = lhs - rhs + n, d = eq.as_numer_denom() + if not n: + return S.Zero, S.One + + free = n.free_symbols + if not symbols: + symbols = free + else: + bad = [s for s in symbols if not s.is_Symbol] + if bad: + if len(bad) == 1: + bad = bad[0] + if len(symbols) == 1: + eg = 'solve(%s, %s)' % (eq, symbols[0]) + else: + eg = 'solve(%s, *%s)' % (eq, list(symbols)) + raise ValueError(filldedent(''' + solve_linear only handles symbols, not %s. To isolate + non-symbols use solve, e.g. >>> %s <<<. + ''' % (bad, eg))) + symbols = free.intersection(symbols) + symbols = symbols.difference(exclude) + if not symbols: + return S.Zero, S.One + + # derivatives are easy to do but tricky to analyze to see if they + # are going to disallow a linear solution, so for simplicity we + # just evaluate the ones that have the symbols of interest + derivs = defaultdict(list) + for der in n.atoms(Derivative): + csym = der.free_symbols & symbols + for c in csym: + derivs[c].append(der) + + all_zero = True + for xi in sorted(symbols, key=default_sort_key): # canonical order + # if there are derivatives in this var, calculate them now + if isinstance(derivs[xi], list): + derivs[xi] = {der: der.doit() for der in derivs[xi]} + newn = n.subs(derivs[xi]) + dnewn_dxi = newn.diff(xi) + # dnewn_dxi can be nonzero if it survives differentation by any + # of its free symbols + free = dnewn_dxi.free_symbols + if dnewn_dxi and (not free or any(dnewn_dxi.diff(s) for s in free) or free == symbols): + all_zero = False + if dnewn_dxi is S.NaN: + break + if xi not in dnewn_dxi.free_symbols: + vi = -1/dnewn_dxi*(newn.subs(xi, 0)) + if dens is None: + dens = _simple_dens(eq, symbols) + if not any(checksol(di, {xi: vi}, minimal=True) is True + for di in dens): + # simplify any trivial integral + irep = [(i, i.doit()) for i in vi.atoms(Integral) if + i.function.is_number] + # do a slight bit of simplification + vi = expand_mul(vi.subs(irep)) + return xi, vi + if all_zero: + return S.Zero, S.One + if n.is_Symbol: # no solution for this symbol was found + return S.Zero, S.Zero + return n, d + + +def minsolve_linear_system(system, *symbols, **flags): + r""" + Find a particular solution to a linear system. + + Explanation + =========== + + In particular, try to find a solution with the minimal possible number + of non-zero variables using a naive algorithm with exponential complexity. + If ``quick=True``, a heuristic is used. + + """ + quick = flags.get('quick', False) + # Check if there are any non-zero solutions at all + s0 = solve_linear_system(system, *symbols, **flags) + if not s0 or all(v == 0 for v in s0.values()): + return s0 + if quick: + # We just solve the system and try to heuristically find a nice + # solution. + s = solve_linear_system(system, *symbols) + def update(determined, solution): + delete = [] + for k, v in solution.items(): + solution[k] = v.subs(determined) + if not solution[k].free_symbols: + delete.append(k) + determined[k] = solution[k] + for k in delete: + del solution[k] + determined = {} + update(determined, s) + while s: + # NOTE sort by default_sort_key to get deterministic result + k = max((k for k in s.values()), + key=lambda x: (len(x.free_symbols), default_sort_key(x))) + kfree = k.free_symbols + x = next(reversed(list(ordered(kfree)))) + if len(kfree) != 1: + determined[x] = S.Zero + else: + val = _vsolve(k, x, check=False)[0] + if not val and not any(v.subs(x, val) for v in s.values()): + determined[x] = S.One + else: + determined[x] = val + update(determined, s) + return determined + else: + # We try to select n variables which we want to be non-zero. + # All others will be assumed zero. We try to solve the modified system. + # If there is a non-trivial solution, just set the free variables to + # one. If we do this for increasing n, trying all combinations of + # variables, we will find an optimal solution. + # We speed up slightly by starting at one less than the number of + # variables the quick method manages. + N = len(symbols) + bestsol = minsolve_linear_system(system, *symbols, quick=True) + n0 = len([x for x in bestsol.values() if x != 0]) + for n in range(n0 - 1, 1, -1): + debugf('minsolve: %s', n) + thissol = None + for nonzeros in combinations(range(N), n): + subm = Matrix([system.col(i).T for i in nonzeros] + [system.col(-1).T]).T + s = solve_linear_system(subm, *[symbols[i] for i in nonzeros]) + if s and not all(v == 0 for v in s.values()): + subs = [(symbols[v], S.One) for v in nonzeros] + for k, v in s.items(): + s[k] = v.subs(subs) + for sym in symbols: + if sym not in s: + if symbols.index(sym) in nonzeros: + s[sym] = S.One + else: + s[sym] = S.Zero + thissol = s + break + if thissol is None: + break + bestsol = thissol + return bestsol + + +def solve_linear_system(system, *symbols, **flags): + r""" + Solve system of $N$ linear equations with $M$ variables, which means + both under- and overdetermined systems are supported. + + Explanation + =========== + + The possible number of solutions is zero, one, or infinite. Respectively, + this procedure will return None or a dictionary with solutions. In the + case of underdetermined systems, all arbitrary parameters are skipped. + This may cause a situation in which an empty dictionary is returned. + In that case, all symbols can be assigned arbitrary values. + + Input to this function is a $N\times M + 1$ matrix, which means it has + to be in augmented form. If you prefer to enter $N$ equations and $M$ + unknowns then use ``solve(Neqs, *Msymbols)`` instead. Note: a local + copy of the matrix is made by this routine so the matrix that is + passed will not be modified. + + The algorithm used here is fraction-free Gaussian elimination, + which results, after elimination, in an upper-triangular matrix. + Then solutions are found using back-substitution. This approach + is more efficient and compact than the Gauss-Jordan method. + + Examples + ======== + + >>> from sympy import Matrix, solve_linear_system + >>> from sympy.abc import x, y + + Solve the following system:: + + x + 4 y == 2 + -2 x + y == 14 + + >>> system = Matrix(( (1, 4, 2), (-2, 1, 14))) + >>> solve_linear_system(system, x, y) + {x: -6, y: 2} + + A degenerate system returns an empty dictionary: + + >>> system = Matrix(( (0,0,0), (0,0,0) )) + >>> solve_linear_system(system, x, y) + {} + + """ + assert system.shape[1] == len(symbols) + 1 + + # This is just a wrapper for solve_lin_sys + eqs = list(system * Matrix(symbols + (-1,))) + eqs, ring = sympy_eqs_to_ring(eqs, symbols) + sol = solve_lin_sys(eqs, ring, _raw=False) + if sol is not None: + sol = {sym:val for sym, val in sol.items() if sym != val} + return sol + + +def solve_undetermined_coeffs(equ, coeffs, *syms, **flags): + r""" + Solve a system of equations in $k$ parameters that is formed by + matching coefficients in variables ``coeffs`` that are on + factors dependent on the remaining variables (or those given + explicitly by ``syms``. + + Explanation + =========== + + The result of this function is a dictionary with symbolic values of those + parameters with respect to coefficients in $q$ -- empty if there + is no solution or coefficients do not appear in the equation -- else + None (if the system was not recognized). If there is more than one + solution, the solutions are passed as a list. The output can be modified using + the same semantics as for `solve` since the flags that are passed are sent + directly to `solve` so, for example the flag ``dict=True`` will always return a list + of solutions as dictionaries. + + This function accepts both Equality and Expr class instances. + The solving process is most efficient when symbols are specified + in addition to parameters to be determined, but an attempt to + determine them (if absent) will be made. If an expected solution is not + obtained (and symbols were not specified) try specifying them. + + Examples + ======== + + >>> from sympy import Eq, solve_undetermined_coeffs + >>> from sympy.abc import a, b, c, h, p, k, x, y + + >>> solve_undetermined_coeffs(Eq(a*x + a + b, x/2), [a, b], x) + {a: 1/2, b: -1/2} + >>> solve_undetermined_coeffs(a - 2, [a]) + {a: 2} + + The equation can be nonlinear in the symbols: + + >>> X, Y, Z = y, x**y, y*x**y + >>> eq = a*X + b*Y + c*Z - X - 2*Y - 3*Z + >>> coeffs = a, b, c + >>> syms = x, y + >>> solve_undetermined_coeffs(eq, coeffs, syms) + {a: 1, b: 2, c: 3} + + And the system can be nonlinear in coefficients, too, but if + there is only a single solution, it will be returned as a + dictionary: + + >>> eq = a*x**2 + b*x + c - ((x - h)**2 + 4*p*k)/4/p + >>> solve_undetermined_coeffs(eq, (h, p, k), x) + {h: -b/(2*a), k: (4*a*c - b**2)/(4*a), p: 1/(4*a)} + + Multiple solutions are always returned in a list: + + >>> solve_undetermined_coeffs(a**2*x + b - x, [a, b], x) + [{a: -1, b: 0}, {a: 1, b: 0}] + + Using flag ``dict=True`` (in keeping with semantics in :func:`~.solve`) + will force the result to always be a list with any solutions + as elements in that list. + + >>> solve_undetermined_coeffs(a*x - 2*x, [a], dict=True) + [{a: 2}] + """ + if not (coeffs and all(i.is_Symbol for i in coeffs)): + raise ValueError('must provide symbols for coeffs') + + if isinstance(equ, Eq): + eq = equ.lhs - equ.rhs + else: + eq = equ + + ceq = cancel(eq) + xeq = _mexpand(ceq.as_numer_denom()[0], recursive=True) + + free = xeq.free_symbols + coeffs = free & set(coeffs) + if not coeffs: + return ([], {}) if flags.get('set', None) else [] # solve(0, x) -> [] + + if not syms: + # e.g. A*exp(x) + B - (exp(x) + y) separated into parts that + # don't/do depend on coeffs gives + # -(exp(x) + y), A*exp(x) + B + # then see what symbols are common to both + # {x} = {x, A, B} - {x, y} + ind, dep = xeq.as_independent(*coeffs, as_Add=True) + dfree = dep.free_symbols + syms = dfree & ind.free_symbols + if not syms: + # but if the system looks like (a + b)*x + b - c + # then {} = {a, b, x} - c + # so calculate {x} = {a, b, x} - {a, b} + syms = dfree - set(coeffs) + if not syms: + syms = [Dummy()] + else: + if len(syms) == 1 and iterable(syms[0]): + syms = syms[0] + e, s, _ = recast_to_symbols([xeq], syms) + xeq = e[0] + syms = s + + # find the functional forms in which symbols appear + + gens = set(xeq.as_coefficients_dict(*syms).keys()) - {1} + cset = set(coeffs) + if any(g.has_xfree(cset) for g in gens): + return # a generator contained a coefficient symbol + + # make sure we are working with symbols for generators + + e, gens, _ = recast_to_symbols([xeq], list(gens)) + xeq = e[0] + + # collect coefficients in front of generators + + system = list(collect(xeq, gens, evaluate=False).values()) + + # get a solution + + soln = solve(system, coeffs, **flags) + + # unpack unless told otherwise if length is 1 + + settings = flags.get('dict', None) or flags.get('set', None) + if type(soln) is dict or settings or len(soln) != 1: + return soln + return soln[0] + + +def solve_linear_system_LU(matrix, syms): + """ + Solves the augmented matrix system using ``LUsolve`` and returns a + dictionary in which solutions are keyed to the symbols of *syms* as ordered. + + Explanation + =========== + + The matrix must be invertible. + + Examples + ======== + + >>> from sympy import Matrix, solve_linear_system_LU + >>> from sympy.abc import x, y, z + + >>> solve_linear_system_LU(Matrix([ + ... [1, 2, 0, 1], + ... [3, 2, 2, 1], + ... [2, 0, 0, 1]]), [x, y, z]) + {x: 1/2, y: 1/4, z: -1/2} + + See Also + ======== + + LUsolve + + """ + if matrix.rows != matrix.cols - 1: + raise ValueError("Rows should be equal to columns - 1") + A = matrix[:matrix.rows, :matrix.rows] + b = matrix[:, matrix.cols - 1:] + soln = A.LUsolve(b) + solutions = {} + for i in range(soln.rows): + solutions[syms[i]] = soln[i, 0] + return solutions + + +def det_perm(M): + """ + Return the determinant of *M* by using permutations to select factors. + + Explanation + =========== + + For sizes larger than 8 the number of permutations becomes prohibitively + large, or if there are no symbols in the matrix, it is better to use the + standard determinant routines (e.g., ``M.det()``.) + + See Also + ======== + + det_minor + det_quick + + """ + args = [] + s = True + n = M.rows + list_ = M.flat() + for perm in generate_bell(n): + fac = [] + idx = 0 + for j in perm: + fac.append(list_[idx + j]) + idx += n + term = Mul(*fac) # disaster with unevaluated Mul -- takes forever for n=7 + args.append(term if s else -term) + s = not s + return Add(*args) + + +def det_minor(M): + """ + Return the ``det(M)`` computed from minors without + introducing new nesting in products. + + See Also + ======== + + det_perm + det_quick + + """ + n = M.rows + if n == 2: + return M[0, 0]*M[1, 1] - M[1, 0]*M[0, 1] + else: + return sum((1, -1)[i % 2]*Add(*[M[0, i]*d for d in + Add.make_args(det_minor(M.minor_submatrix(0, i)))]) + if M[0, i] else S.Zero for i in range(n)) + + +def det_quick(M, method=None): + """ + Return ``det(M)`` assuming that either + there are lots of zeros or the size of the matrix + is small. If this assumption is not met, then the normal + Matrix.det function will be used with method = ``method``. + + See Also + ======== + + det_minor + det_perm + + """ + if any(i.has(Symbol) for i in M): + if M.rows < 8 and all(i.has(Symbol) for i in M): + return det_perm(M) + return det_minor(M) + else: + return M.det(method=method) if method else M.det() + + +def inv_quick(M): + """Return the inverse of ``M``, assuming that either + there are lots of zeros or the size of the matrix + is small. + """ + if not all(i.is_Number for i in M): + if not any(i.is_Number for i in M): + det = lambda _: det_perm(_) + else: + det = lambda _: det_minor(_) + else: + return M.inv() + n = M.rows + d = det(M) + if d == S.Zero: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible") + ret = zeros(n) + s1 = -1 + for i in range(n): + s = s1 = -s1 + for j in range(n): + di = det(M.minor_submatrix(i, j)) + ret[j, i] = s*di/d + s = -s + return ret + + +# these are functions that have multiple inverse values per period +multi_inverses = { + sin: lambda x: (asin(x), S.Pi - asin(x)), + cos: lambda x: (acos(x), 2*S.Pi - acos(x)), +} + + +def _vsolve(e, s, **flags): + """return list of scalar values for the solution of e for symbol s""" + return [i[s] for i in _solve(e, s, **flags)] + + +def _tsolve(eq, sym, **flags): + """ + Helper for ``_solve`` that solves a transcendental equation with respect + to the given symbol. Various equations containing powers and logarithms, + can be solved. + + There is currently no guarantee that all solutions will be returned or + that a real solution will be favored over a complex one. + + Either a list of potential solutions will be returned or None will be + returned (in the case that no method was known to get a solution + for the equation). All other errors (like the inability to cast an + expression as a Poly) are unhandled. + + Examples + ======== + + >>> from sympy import log, ordered + >>> from sympy.solvers.solvers import _tsolve as tsolve + >>> from sympy.abc import x + + >>> list(ordered(tsolve(3**(2*x + 5) - 4, x))) + [-5/2 + log(2)/log(3), (-5*log(3)/2 + log(2) + I*pi)/log(3)] + + >>> tsolve(log(x) + 2*x, x) + [LambertW(2)/2] + + """ + if 'tsolve_saw' not in flags: + flags['tsolve_saw'] = [] + if eq in flags['tsolve_saw']: + return None + else: + flags['tsolve_saw'].append(eq) + + rhs, lhs = _invert(eq, sym) + + if lhs == sym: + return [rhs] + try: + if lhs.is_Add: + # it's time to try factoring; powdenest is used + # to try get powers in standard form for better factoring + f = factor(powdenest(lhs - rhs)) + if f.is_Mul: + return _vsolve(f, sym, **flags) + if rhs: + f = logcombine(lhs, force=flags.get('force', True)) + if f.count(log) != lhs.count(log): + if isinstance(f, log): + return _vsolve(f.args[0] - exp(rhs), sym, **flags) + return _tsolve(f - rhs, sym, **flags) + + elif lhs.is_Pow: + if lhs.exp.is_Integer: + if lhs - rhs != eq: + return _vsolve(lhs - rhs, sym, **flags) + + if sym not in lhs.exp.free_symbols: + return _vsolve(lhs.base - rhs**(1/lhs.exp), sym, **flags) + + # _tsolve calls this with Dummy before passing the actual number in. + if any(t.is_Dummy for t in rhs.free_symbols): + raise NotImplementedError # _tsolve will call here again... + + # a ** g(x) == 0 + if not rhs: + # f(x)**g(x) only has solutions where f(x) == 0 and g(x) != 0 at + # the same place + sol_base = _vsolve(lhs.base, sym, **flags) + return [s for s in sol_base if lhs.exp.subs(sym, s) != 0] # XXX use checksol here? + + # a ** g(x) == b + if not lhs.base.has(sym): + if lhs.base == 0: + return _vsolve(lhs.exp, sym, **flags) if rhs != 0 else [] + + # Gets most solutions... + if lhs.base == rhs.as_base_exp()[0]: + # handles case when bases are equal + sol = _vsolve(lhs.exp - rhs.as_base_exp()[1], sym, **flags) + else: + # handles cases when bases are not equal and exp + # may or may not be equal + f = exp(log(lhs.base)*lhs.exp) - exp(log(rhs)) + sol = _vsolve(f, sym, **flags) + + # Check for duplicate solutions + def equal(expr1, expr2): + _ = Dummy() + eq = checksol(expr1 - _, _, expr2) + if eq is None: + if nsimplify(expr1) != nsimplify(expr2): + return False + # they might be coincidentally the same + # so check more rigorously + eq = expr1.equals(expr2) # XXX expensive but necessary? + return eq + + # Guess a rational exponent + e_rat = nsimplify(log(abs(rhs))/log(abs(lhs.base))) + e_rat = simplify(posify(e_rat)[0]) + n, d = fraction(e_rat) + if expand(lhs.base**n - rhs**d) == 0: + sol = [s for s in sol if not equal(lhs.exp.subs(sym, s), e_rat)] + sol.extend(_vsolve(lhs.exp - e_rat, sym, **flags)) + + return list(set(sol)) + + # f(x) ** g(x) == c + else: + sol = [] + logform = lhs.exp*log(lhs.base) - log(rhs) + if logform != lhs - rhs: + try: + sol.extend(_vsolve(logform, sym, **flags)) + except NotImplementedError: + pass + + # Collect possible solutions and check with substitution later. + check = [] + if rhs == 1: + # f(x) ** g(x) = 1 -- g(x)=0 or f(x)=+-1 + check.extend(_vsolve(lhs.exp, sym, **flags)) + check.extend(_vsolve(lhs.base - 1, sym, **flags)) + check.extend(_vsolve(lhs.base + 1, sym, **flags)) + elif rhs.is_Rational: + for d in (i for i in divisors(abs(rhs.p)) if i != 1): + e, t = integer_log(rhs.p, d) + if not t: + continue # rhs.p != d**b + for s in divisors(abs(rhs.q)): + if s**e== rhs.q: + r = Rational(d, s) + check.extend(_vsolve(lhs.base - r, sym, **flags)) + check.extend(_vsolve(lhs.base + r, sym, **flags)) + check.extend(_vsolve(lhs.exp - e, sym, **flags)) + elif rhs.is_irrational: + b_l, e_l = lhs.base.as_base_exp() + n, d = (e_l*lhs.exp).as_numer_denom() + b, e = sqrtdenest(rhs).as_base_exp() + check = [sqrtdenest(i) for i in (_vsolve(lhs.base - b, sym, **flags))] + check.extend([sqrtdenest(i) for i in (_vsolve(lhs.exp - e, sym, **flags))]) + if e_l*d != 1: + check.extend(_vsolve(b_l**n - rhs**(e_l*d), sym, **flags)) + for s in check: + ok = checksol(eq, sym, s) + if ok is None: + ok = eq.subs(sym, s).equals(0) + if ok: + sol.append(s) + return list(set(sol)) + + elif lhs.is_Function and len(lhs.args) == 1: + if lhs.func in multi_inverses: + # sin(x) = 1/3 -> x - asin(1/3) & x - (pi - asin(1/3)) + soln = [] + for i in multi_inverses[type(lhs)](rhs): + soln.extend(_vsolve(lhs.args[0] - i, sym, **flags)) + return list(set(soln)) + elif lhs.func == LambertW: + return _vsolve(lhs.args[0] - rhs*exp(rhs), sym, **flags) + + rewrite = lhs.rewrite(exp) + rewrite = rebuild(rewrite) # avoid rewrites involving evaluate=False + if rewrite != lhs: + return _vsolve(rewrite - rhs, sym, **flags) + except NotImplementedError: + pass + + # maybe it is a lambert pattern + if flags.pop('bivariate', True): + # lambert forms may need some help being recognized, e.g. changing + # 2**(3*x) + x**3*log(2)**3 + 3*x**2*log(2)**2 + 3*x*log(2) + 1 + # to 2**(3*x) + (x*log(2) + 1)**3 + + # make generator in log have exponent of 1 + logs = eq.atoms(log) + spow = min( + {i.exp for j in logs for i in j.atoms(Pow) + if i.base == sym} or {1}) + if spow != 1: + p = sym**spow + u = Dummy('bivariate-cov') + ueq = eq.subs(p, u) + if not ueq.has_free(sym): + sol = _vsolve(ueq, u, **flags) + inv = _vsolve(p - u, sym) + return [i.subs(u, s) for i in inv for s in sol] + + g = _filtered_gens(eq.as_poly(), sym) + up_or_log = set() + for gi in g: + if isinstance(gi, (exp, log)) or (gi.is_Pow and gi.base == S.Exp1): + up_or_log.add(gi) + elif gi.is_Pow: + gisimp = powdenest(expand_power_exp(gi)) + if gisimp.is_Pow and sym in gisimp.exp.free_symbols: + up_or_log.add(gi) + eq_down = expand_log(expand_power_exp(eq)).subs( + dict(list(zip(up_or_log, [0]*len(up_or_log))))) + eq = expand_power_exp(factor(eq_down, deep=True) + (eq - eq_down)) + rhs, lhs = _invert(eq, sym) + if lhs.has(sym): + try: + poly = lhs.as_poly() + g = _filtered_gens(poly, sym) + _eq = lhs - rhs + sols = _solve_lambert(_eq, sym, g) + # use a simplified form if it satisfies eq + # and has fewer operations + for n, s in enumerate(sols): + ns = nsimplify(s) + if ns != s and ns.count_ops() <= s.count_ops(): + ok = checksol(_eq, sym, ns) + if ok is None: + ok = _eq.subs(sym, ns).equals(0) + if ok: + sols[n] = ns + return sols + except NotImplementedError: + # maybe it's a convoluted function + if len(g) == 2: + try: + gpu = bivariate_type(lhs - rhs, *g) + if gpu is None: + raise NotImplementedError + g, p, u = gpu + flags['bivariate'] = False + inversion = _tsolve(g - u, sym, **flags) + if inversion: + sol = _vsolve(p, u, **flags) + return list({i.subs(u, s) + for i in inversion for s in sol}) + except NotImplementedError: + pass + else: + pass + + if flags.pop('force', True): + flags['force'] = False + pos, reps = posify(lhs - rhs) + if rhs == S.ComplexInfinity: + return [] + for u, s in reps.items(): + if s == sym: + break + else: + u = sym + if pos.has(u): + try: + soln = _vsolve(pos, u, **flags) + return [s.subs(reps) for s in soln] + except NotImplementedError: + pass + else: + pass # here for coverage + + return # here for coverage + + +# TODO: option for calculating J numerically + +@conserve_mpmath_dps +def nsolve(*args, dict=False, **kwargs): + r""" + Solve a nonlinear equation system numerically: ``nsolve(f, [args,] x0, + modules=['mpmath'], **kwargs)``. + + Explanation + =========== + + ``f`` is a vector function of symbolic expressions representing the system. + *args* are the variables. If there is only one variable, this argument can + be omitted. ``x0`` is a starting vector close to a solution. + + Use the modules keyword to specify which modules should be used to + evaluate the function and the Jacobian matrix. Make sure to use a module + that supports matrices. For more information on the syntax, please see the + docstring of ``lambdify``. + + If the keyword arguments contain ``dict=True`` (default is False) ``nsolve`` + will return a list (perhaps empty) of solution mappings. This might be + especially useful if you want to use ``nsolve`` as a fallback to solve since + using the dict argument for both methods produces return values of + consistent type structure. Please note: to keep this consistent with + ``solve``, the solution will be returned in a list even though ``nsolve`` + (currently at least) only finds one solution at a time. + + Overdetermined systems are supported. + + Examples + ======== + + >>> from sympy import Symbol, nsolve + >>> import mpmath + >>> mpmath.mp.dps = 15 + >>> x1 = Symbol('x1') + >>> x2 = Symbol('x2') + >>> f1 = 3 * x1**2 - 2 * x2**2 - 1 + >>> f2 = x1**2 - 2 * x1 + x2**2 + 2 * x2 - 8 + >>> print(nsolve((f1, f2), (x1, x2), (-1, 1))) + Matrix([[-1.19287309935246], [1.27844411169911]]) + + For one-dimensional functions the syntax is simplified: + + >>> from sympy import sin, nsolve + >>> from sympy.abc import x + >>> nsolve(sin(x), x, 2) + 3.14159265358979 + >>> nsolve(sin(x), 2) + 3.14159265358979 + + To solve with higher precision than the default, use the prec argument: + + >>> from sympy import cos + >>> nsolve(cos(x) - x, 1) + 0.739085133215161 + >>> nsolve(cos(x) - x, 1, prec=50) + 0.73908513321516064165531208767387340401341175890076 + >>> cos(_) + 0.73908513321516064165531208767387340401341175890076 + + To solve for complex roots of real functions, a nonreal initial point + must be specified: + + >>> from sympy import I + >>> nsolve(x**2 + 2, I) + 1.4142135623731*I + + ``mpmath.findroot`` is used and you can find their more extensive + documentation, especially concerning keyword parameters and + available solvers. Note, however, that functions which are very + steep near the root, the verification of the solution may fail. In + this case you should use the flag ``verify=False`` and + independently verify the solution. + + >>> from sympy import cos, cosh + >>> f = cos(x)*cosh(x) - 1 + >>> nsolve(f, 3.14*100) + Traceback (most recent call last): + ... + ValueError: Could not find root within given tolerance. (1.39267e+230 > 2.1684e-19) + >>> ans = nsolve(f, 3.14*100, verify=False); ans + 312.588469032184 + >>> f.subs(x, ans).n(2) + 2.1e+121 + >>> (f/f.diff(x)).subs(x, ans).n(2) + 7.4e-15 + + One might safely skip the verification if bounds of the root are known + and a bisection method is used: + + >>> bounds = lambda i: (3.14*i, 3.14*(i + 1)) + >>> nsolve(f, bounds(100), solver='bisect', verify=False) + 315.730061685774 + + Alternatively, a function may be better behaved when the + denominator is ignored. Since this is not always the case, however, + the decision of what function to use is left to the discretion of + the user. + + >>> eq = x**2/(1 - x)/(1 - 2*x)**2 - 100 + >>> nsolve(eq, 0.46) + Traceback (most recent call last): + ... + ValueError: Could not find root within given tolerance. (10000 > 2.1684e-19) + Try another starting point or tweak arguments. + >>> nsolve(eq.as_numer_denom()[0], 0.46) + 0.46792545969349058 + + """ + # there are several other SymPy functions that use method= so + # guard against that here + if 'method' in kwargs: + raise ValueError(filldedent(''' + Keyword "method" should not be used in this context. When using + some mpmath solvers directly, the keyword "method" is + used, but when using nsolve (and findroot) the keyword to use is + "solver".''')) + + if 'prec' in kwargs: + import mpmath + mpmath.mp.dps = kwargs.pop('prec') + + # keyword argument to return result as a dictionary + as_dict = dict + from builtins import dict # to unhide the builtin + + # interpret arguments + if len(args) == 3: + f = args[0] + fargs = args[1] + x0 = args[2] + if iterable(fargs) and iterable(x0): + if len(x0) != len(fargs): + raise TypeError('nsolve expected exactly %i guess vectors, got %i' + % (len(fargs), len(x0))) + elif len(args) == 2: + f = args[0] + fargs = None + x0 = args[1] + if iterable(f): + raise TypeError('nsolve expected 3 arguments, got 2') + elif len(args) < 2: + raise TypeError('nsolve expected at least 2 arguments, got %i' + % len(args)) + else: + raise TypeError('nsolve expected at most 3 arguments, got %i' + % len(args)) + modules = kwargs.get('modules', ['mpmath']) + if iterable(f): + f = list(f) + for i, fi in enumerate(f): + if isinstance(fi, Eq): + f[i] = fi.lhs - fi.rhs + f = Matrix(f).T + if iterable(x0): + x0 = list(x0) + if not isinstance(f, Matrix): + # assume it's a SymPy expression + if isinstance(f, Eq): + f = f.lhs - f.rhs + elif f.is_Relational: + raise TypeError('nsolve cannot accept inequalities') + syms = f.free_symbols + if fargs is None: + fargs = syms.copy().pop() + if not (len(syms) == 1 and (fargs in syms or fargs[0] in syms)): + raise ValueError(filldedent(''' + expected a one-dimensional and numerical function''')) + + # the function is much better behaved if there is no denominator + # but sending the numerator is left to the user since sometimes + # the function is better behaved when the denominator is present + # e.g., issue 11768 + + f = lambdify(fargs, f, modules) + x = sympify(findroot(f, x0, **kwargs)) + if as_dict: + return [{fargs: x}] + return x + + if len(fargs) > f.cols: + raise NotImplementedError(filldedent(''' + need at least as many equations as variables''')) + verbose = kwargs.get('verbose', False) + if verbose: + print('f(x):') + print(f) + # derive Jacobian + J = f.jacobian(fargs) + if verbose: + print('J(x):') + print(J) + # create functions + f = lambdify(fargs, f.T, modules) + J = lambdify(fargs, J, modules) + # solve the system numerically + x = findroot(f, x0, J=J, **kwargs) + if as_dict: + return [dict(zip(fargs, [sympify(xi) for xi in x]))] + return Matrix(x) + + +def _invert(eq, *symbols, **kwargs): + """ + Return tuple (i, d) where ``i`` is independent of *symbols* and ``d`` + contains symbols. + + Explanation + =========== + + ``i`` and ``d`` are obtained after recursively using algebraic inversion + until an uninvertible ``d`` remains. If there are no free symbols then + ``d`` will be zero. Some (but not necessarily all) solutions to the + expression ``i - d`` will be related to the solutions of the original + expression. + + Examples + ======== + + >>> from sympy.solvers.solvers import _invert as invert + >>> from sympy import sqrt, cos + >>> from sympy.abc import x, y + >>> invert(x - 3) + (3, x) + >>> invert(3) + (3, 0) + >>> invert(2*cos(x) - 1) + (1/2, cos(x)) + >>> invert(sqrt(x) - 3) + (3, sqrt(x)) + >>> invert(sqrt(x) + y, x) + (-y, sqrt(x)) + >>> invert(sqrt(x) + y, y) + (-sqrt(x), y) + >>> invert(sqrt(x) + y, x, y) + (0, sqrt(x) + y) + + If there is more than one symbol in a power's base and the exponent + is not an Integer, then the principal root will be used for the + inversion: + + >>> invert(sqrt(x + y) - 2) + (4, x + y) + >>> invert(sqrt(x + y) + 2) # note +2 instead of -2 + (4, x + y) + + If the exponent is an Integer, setting ``integer_power`` to True + will force the principal root to be selected: + + >>> invert(x**2 - 4, integer_power=True) + (2, x) + + """ + eq = sympify(eq) + if eq.args: + # make sure we are working with flat eq + eq = eq.func(*eq.args) + free = eq.free_symbols + if not symbols: + symbols = free + if not free & set(symbols): + return eq, S.Zero + + dointpow = bool(kwargs.get('integer_power', False)) + + lhs = eq + rhs = S.Zero + while True: + was = lhs + while True: + indep, dep = lhs.as_independent(*symbols) + + # dep + indep == rhs + if lhs.is_Add: + # this indicates we have done it all + if indep.is_zero: + break + + lhs = dep + rhs -= indep + + # dep * indep == rhs + else: + # this indicates we have done it all + if indep is S.One: + break + + lhs = dep + rhs /= indep + + # collect like-terms in symbols + if lhs.is_Add: + terms = {} + for a in lhs.args: + i, d = a.as_independent(*symbols) + terms.setdefault(d, []).append(i) + if any(len(v) > 1 for v in terms.values()): + args = [] + for d, i in terms.items(): + if len(i) > 1: + args.append(Add(*i)*d) + else: + args.append(i[0]*d) + lhs = Add(*args) + + # if it's a two-term Add with rhs = 0 and two powers we can get the + # dependent terms together, e.g. 3*f(x) + 2*g(x) -> f(x)/g(x) = -2/3 + if lhs.is_Add and not rhs and len(lhs.args) == 2 and \ + not lhs.is_polynomial(*symbols): + a, b = ordered(lhs.args) + ai, ad = a.as_independent(*symbols) + bi, bd = b.as_independent(*symbols) + if any(_ispow(i) for i in (ad, bd)): + a_base, a_exp = ad.as_base_exp() + b_base, b_exp = bd.as_base_exp() + if a_base == b_base and a_exp.extract_additively(b_exp) is None: + # a = -b and exponents do not have canceling terms/factors + # e.g. if exponents were 3*x and x then the ratio would have + # an exponent of 2*x: one of the roots would be lost + rat = powsimp(powdenest(ad/bd)) + lhs = rat + rhs = -bi/ai + else: + rat = ad/bd + _lhs = powsimp(ad/bd) + if _lhs != rat: + lhs = _lhs + rhs = -bi/ai + elif ai == -bi: + if isinstance(ad, Function) and ad.func == bd.func: + if len(ad.args) == len(bd.args) == 1: + lhs = ad.args[0] - bd.args[0] + elif len(ad.args) == len(bd.args): + # should be able to solve + # f(x, y) - f(2 - x, 0) == 0 -> x == 1 + raise NotImplementedError( + 'equal function with more than 1 argument') + else: + raise ValueError( + 'function with different numbers of args') + + elif lhs.is_Mul and any(_ispow(a) for a in lhs.args): + lhs = powsimp(powdenest(lhs)) + + if lhs.is_Function: + if hasattr(lhs, 'inverse') and lhs.inverse() is not None and len(lhs.args) == 1: + # -1 + # f(x) = g -> x = f (g) + # + # /!\ inverse should not be defined if there are multiple values + # for the function -- these are handled in _tsolve + # + rhs = lhs.inverse()(rhs) + lhs = lhs.args[0] + elif isinstance(lhs, atan2): + y, x = lhs.args + lhs = 2*atan(y/(sqrt(x**2 + y**2) + x)) + elif lhs.func == rhs.func: + if len(lhs.args) == len(rhs.args) == 1: + lhs = lhs.args[0] + rhs = rhs.args[0] + elif len(lhs.args) == len(rhs.args): + # should be able to solve + # f(x, y) == f(2, 3) -> x == 2 + # f(x, x + y) == f(2, 3) -> x == 2 + raise NotImplementedError( + 'equal function with more than 1 argument') + else: + raise ValueError( + 'function with different numbers of args') + + + if rhs and lhs.is_Pow and lhs.exp.is_Integer and lhs.exp < 0: + lhs = 1/lhs + rhs = 1/rhs + + # base**a = b -> base = b**(1/a) if + # a is an Integer and dointpow=True (this gives real branch of root) + # a is not an Integer and the equation is multivariate and the + # base has more than 1 symbol in it + # The rationale for this is that right now the multi-system solvers + # doesn't try to resolve generators to see, for example, if the whole + # system is written in terms of sqrt(x + y) so it will just fail, so we + # do that step here. + if lhs.is_Pow and ( + lhs.exp.is_Integer and dointpow or not lhs.exp.is_Integer and + len(symbols) > 1 and len(lhs.base.free_symbols & set(symbols)) > 1): + rhs = rhs**(1/lhs.exp) + lhs = lhs.base + + if lhs == was: + break + return rhs, lhs + + +def unrad(eq, *syms, **flags): + """ + Remove radicals with symbolic arguments and return (eq, cov), + None, or raise an error. + + Explanation + =========== + + None is returned if there are no radicals to remove. + + NotImplementedError is raised if there are radicals and they cannot be + removed or if the relationship between the original symbols and the + change of variable needed to rewrite the system as a polynomial cannot + be solved. + + Otherwise the tuple, ``(eq, cov)``, is returned where: + + *eq*, ``cov`` + *eq* is an equation without radicals (in the symbol(s) of + interest) whose solutions are a superset of the solutions to the + original expression. *eq* might be rewritten in terms of a new + variable; the relationship to the original variables is given by + ``cov`` which is a list containing ``v`` and ``v**p - b`` where + ``p`` is the power needed to clear the radical and ``b`` is the + radical now expressed as a polynomial in the symbols of interest. + For example, for sqrt(2 - x) the tuple would be + ``(c, c**2 - 2 + x)``. The solutions of *eq* will contain + solutions to the original equation (if there are any). + + *syms* + An iterable of symbols which, if provided, will limit the focus of + radical removal: only radicals with one or more of the symbols of + interest will be cleared. All free symbols are used if *syms* is not + set. + + *flags* are used internally for communication during recursive calls. + Two options are also recognized: + + ``take``, when defined, is interpreted as a single-argument function + that returns True if a given Pow should be handled. + + Radicals can be removed from an expression if: + + * All bases of the radicals are the same; a change of variables is + done in this case. + * If all radicals appear in one term of the expression. + * There are only four terms with sqrt() factors or there are less than + four terms having sqrt() factors. + * There are only two terms with radicals. + + Examples + ======== + + >>> from sympy.solvers.solvers import unrad + >>> from sympy.abc import x + >>> from sympy import sqrt, Rational, root + + >>> unrad(sqrt(x)*x**Rational(1, 3) + 2) + (x**5 - 64, []) + >>> unrad(sqrt(x) + root(x + 1, 3)) + (-x**3 + x**2 + 2*x + 1, []) + >>> eq = sqrt(x) + root(x, 3) - 2 + >>> unrad(eq) + (_p**3 + _p**2 - 2, [_p, _p**6 - x]) + + """ + + uflags = {"check": False, "simplify": False} + + def _cov(p, e): + if cov: + # XXX - uncovered + oldp, olde = cov + if Poly(e, p).degree(p) in (1, 2): + cov[:] = [p, olde.subs(oldp, _vsolve(e, p, **uflags)[0])] + else: + raise NotImplementedError + else: + cov[:] = [p, e] + + def _canonical(eq, cov): + if cov: + # change symbol to vanilla so no solutions are eliminated + p, e = cov + rep = {p: Dummy(p.name)} + eq = eq.xreplace(rep) + cov = [p.xreplace(rep), e.xreplace(rep)] + + # remove constants and powers of factors since these don't change + # the location of the root; XXX should factor or factor_terms be used? + eq = factor_terms(_mexpand(eq.as_numer_denom()[0], recursive=True), clear=True) + if eq.is_Mul: + args = [] + for f in eq.args: + if f.is_number: + continue + if f.is_Pow: + args.append(f.base) + else: + args.append(f) + eq = Mul(*args) # leave as Mul for more efficient solving + + # make the sign canonical + margs = list(Mul.make_args(eq)) + changed = False + for i, m in enumerate(margs): + if m.could_extract_minus_sign(): + margs[i] = -m + changed = True + if changed: + eq = Mul(*margs, evaluate=False) + + return eq, cov + + def _Q(pow): + # return leading Rational of denominator of Pow's exponent + c = pow.as_base_exp()[1].as_coeff_Mul()[0] + if not c.is_Rational: + return S.One + return c.q + + # define the _take method that will determine whether a term is of interest + def _take(d): + # return True if coefficient of any factor's exponent's den is not 1 + for pow in Mul.make_args(d): + if not pow.is_Pow: + continue + if _Q(pow) == 1: + continue + if pow.free_symbols & syms: + return True + return False + _take = flags.setdefault('_take', _take) + + if isinstance(eq, Eq): + eq = eq.lhs - eq.rhs # XXX legacy Eq as Eqn support + elif not isinstance(eq, Expr): + return + + cov, nwas, rpt = [flags.setdefault(k, v) for k, v in + sorted({"cov": [], "n": None, "rpt": 0}.items())] + + # preconditioning + eq = powdenest(factor_terms(eq, radical=True, clear=True)) + eq = eq.as_numer_denom()[0] + eq = _mexpand(eq, recursive=True) + if eq.is_number: + return + + # see if there are radicals in symbols of interest + syms = set(syms) or eq.free_symbols # _take uses this + poly = eq.as_poly() + gens = [g for g in poly.gens if _take(g)] + if not gens: + return + + # recast poly in terms of eigen-gens + poly = eq.as_poly(*gens) + + # not a polynomial e.g. 1 + sqrt(x)*exp(sqrt(x)) with gen sqrt(x) + if poly is None: + return + + # - an exponent has a symbol of interest (don't handle) + if any(g.exp.has(*syms) for g in gens): + return + + def _rads_bases_lcm(poly): + # if all the bases are the same or all the radicals are in one + # term, `lcm` will be the lcm of the denominators of the + # exponents of the radicals + lcm = 1 + rads = set() + bases = set() + for g in poly.gens: + q = _Q(g) + if q != 1: + rads.add(g) + lcm = ilcm(lcm, q) + bases.add(g.base) + return rads, bases, lcm + rads, bases, lcm = _rads_bases_lcm(poly) + + covsym = Dummy('p', nonnegative=True) + + # only keep in syms symbols that actually appear in radicals; + # and update gens + newsyms = set() + for r in rads: + newsyms.update(syms & r.free_symbols) + if newsyms != syms: + syms = newsyms + # get terms together that have common generators + drad = dict(zip(rads, range(len(rads)))) + rterms = {(): []} + args = Add.make_args(poly.as_expr()) + for t in args: + if _take(t): + common = set(t.as_poly().gens).intersection(rads) + key = tuple(sorted([drad[i] for i in common])) + else: + key = () + rterms.setdefault(key, []).append(t) + others = Add(*rterms.pop(())) + rterms = [Add(*rterms[k]) for k in rterms.keys()] + + # the output will depend on the order terms are processed, so + # make it canonical quickly + rterms = list(reversed(list(ordered(rterms)))) + + ok = False # we don't have a solution yet + depth = sqrt_depth(eq) + + if len(rterms) == 1 and not (rterms[0].is_Add and lcm > 2): + eq = rterms[0]**lcm - ((-others)**lcm) + ok = True + else: + if len(rterms) == 1 and rterms[0].is_Add: + rterms = list(rterms[0].args) + if len(bases) == 1: + b = bases.pop() + if len(syms) > 1: + x = b.free_symbols + else: + x = syms + x = list(ordered(x))[0] + try: + inv = _vsolve(covsym**lcm - b, x, **uflags) + if not inv: + raise NotImplementedError + eq = poly.as_expr().subs(b, covsym**lcm).subs(x, inv[0]) + _cov(covsym, covsym**lcm - b) + return _canonical(eq, cov) + except NotImplementedError: + pass + + if len(rterms) == 2: + if not others: + eq = rterms[0]**lcm - (-rterms[1])**lcm + ok = True + elif not log(lcm, 2).is_Integer: + # the lcm-is-power-of-two case is handled below + r0, r1 = rterms + if flags.get('_reverse', False): + r1, r0 = r0, r1 + i0 = _rads0, _bases0, lcm0 = _rads_bases_lcm(r0.as_poly()) + i1 = _rads1, _bases1, lcm1 = _rads_bases_lcm(r1.as_poly()) + for reverse in range(2): + if reverse: + i0, i1 = i1, i0 + r0, r1 = r1, r0 + _rads1, _, lcm1 = i1 + _rads1 = Mul(*_rads1) + t1 = _rads1**lcm1 + c = covsym**lcm1 - t1 + for x in syms: + try: + sol = _vsolve(c, x, **uflags) + if not sol: + raise NotImplementedError + neweq = r0.subs(x, sol[0]) + covsym*r1/_rads1 + \ + others + tmp = unrad(neweq, covsym) + if tmp: + eq, newcov = tmp + if newcov: + newp, newc = newcov + _cov(newp, c.subs(covsym, + _vsolve(newc, covsym, **uflags)[0])) + else: + _cov(covsym, c) + else: + eq = neweq + _cov(covsym, c) + ok = True + break + except NotImplementedError: + if reverse: + raise NotImplementedError( + 'no successful change of variable found') + else: + pass + if ok: + break + elif len(rterms) == 3: + # two cube roots and another with order less than 5 + # (so an analytical solution can be found) or a base + # that matches one of the cube root bases + info = [_rads_bases_lcm(i.as_poly()) for i in rterms] + RAD = 0 + BASES = 1 + LCM = 2 + if info[0][LCM] != 3: + info.append(info.pop(0)) + rterms.append(rterms.pop(0)) + elif info[1][LCM] != 3: + info.append(info.pop(1)) + rterms.append(rterms.pop(1)) + if info[0][LCM] == info[1][LCM] == 3: + if info[1][BASES] != info[2][BASES]: + info[0], info[1] = info[1], info[0] + rterms[0], rterms[1] = rterms[1], rterms[0] + if info[1][BASES] == info[2][BASES]: + eq = rterms[0]**3 + (rterms[1] + rterms[2] + others)**3 + ok = True + elif info[2][LCM] < 5: + # a*root(A, 3) + b*root(B, 3) + others = c + a, b, c, d, A, B = [Dummy(i) for i in 'abcdAB'] + # zz represents the unraded expression into which the + # specifics for this case are substituted + zz = (c - d)*(A**3*a**9 + 3*A**2*B*a**6*b**3 - + 3*A**2*a**6*c**3 + 9*A**2*a**6*c**2*d - 9*A**2*a**6*c*d**2 + + 3*A**2*a**6*d**3 + 3*A*B**2*a**3*b**6 + 21*A*B*a**3*b**3*c**3 - + 63*A*B*a**3*b**3*c**2*d + 63*A*B*a**3*b**3*c*d**2 - + 21*A*B*a**3*b**3*d**3 + 3*A*a**3*c**6 - 18*A*a**3*c**5*d + + 45*A*a**3*c**4*d**2 - 60*A*a**3*c**3*d**3 + 45*A*a**3*c**2*d**4 - + 18*A*a**3*c*d**5 + 3*A*a**3*d**6 + B**3*b**9 - 3*B**2*b**6*c**3 + + 9*B**2*b**6*c**2*d - 9*B**2*b**6*c*d**2 + 3*B**2*b**6*d**3 + + 3*B*b**3*c**6 - 18*B*b**3*c**5*d + 45*B*b**3*c**4*d**2 - + 60*B*b**3*c**3*d**3 + 45*B*b**3*c**2*d**4 - 18*B*b**3*c*d**5 + + 3*B*b**3*d**6 - c**9 + 9*c**8*d - 36*c**7*d**2 + 84*c**6*d**3 - + 126*c**5*d**4 + 126*c**4*d**5 - 84*c**3*d**6 + 36*c**2*d**7 - + 9*c*d**8 + d**9) + def _t(i): + b = Mul(*info[i][RAD]) + return cancel(rterms[i]/b), Mul(*info[i][BASES]) + aa, AA = _t(0) + bb, BB = _t(1) + cc = -rterms[2] + dd = others + eq = zz.xreplace(dict(zip( + (a, A, b, B, c, d), + (aa, AA, bb, BB, cc, dd)))) + ok = True + # handle power-of-2 cases + if not ok: + if log(lcm, 2).is_Integer and (not others and + len(rterms) == 4 or len(rterms) < 4): + def _norm2(a, b): + return a**2 + b**2 + 2*a*b + + if len(rterms) == 4: + # (r0+r1)**2 - (r2+r3)**2 + r0, r1, r2, r3 = rterms + eq = _norm2(r0, r1) - _norm2(r2, r3) + ok = True + elif len(rterms) == 3: + # (r1+r2)**2 - (r0+others)**2 + r0, r1, r2 = rterms + eq = _norm2(r1, r2) - _norm2(r0, others) + ok = True + elif len(rterms) == 2: + # r0**2 - (r1+others)**2 + r0, r1 = rterms + eq = r0**2 - _norm2(r1, others) + ok = True + + new_depth = sqrt_depth(eq) if ok else depth + rpt += 1 # XXX how many repeats with others unchanging is enough? + if not ok or ( + nwas is not None and len(rterms) == nwas and + new_depth is not None and new_depth == depth and + rpt > 3): + raise NotImplementedError('Cannot remove all radicals') + + flags.update({"cov": cov, "n": len(rterms), "rpt": rpt}) + neq = unrad(eq, *syms, **flags) + if neq: + eq, cov = neq + eq, cov = _canonical(eq, cov) + return eq, cov + + +# delayed imports +from sympy.solvers.bivariate import ( + bivariate_type, _solve_lambert, _filtered_gens) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solveset.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solveset.py new file mode 100644 index 0000000000000000000000000000000000000000..0ae242d9c8c4c0d1c1c46cd968a0c5e547ff0f66 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/solveset.py @@ -0,0 +1,4131 @@ +""" +This module contains functions to: + + - solve a single equation for a single variable, in any domain either real or complex. + + - solve a single transcendental equation for a single variable in any domain either real or complex. + (currently supports solving in real domain only) + + - solve a system of linear equations with N variables and M equations. + + - solve a system of Non Linear Equations with N variables and M equations +""" +from sympy.core.sympify import sympify +from sympy.core import (S, Pow, Dummy, pi, Expr, Wild, Mul, + Add, Basic) +from sympy.core.containers import Tuple +from sympy.core.function import (Lambda, expand_complex, AppliedUndef, + expand_log, _mexpand, expand_trig, nfloat) +from sympy.core.mod import Mod +from sympy.core.numbers import I, Number, Rational, oo +from sympy.core.intfunc import integer_log +from sympy.core.relational import Eq, Ne, Relational +from sympy.core.sorting import default_sort_key, ordered +from sympy.core.symbol import Symbol, _uniquely_named_symbol +from sympy.core.sympify import _sympify +from sympy.core.traversal import preorder_traversal +from sympy.external.gmpy import gcd as number_gcd, lcm as number_lcm +from sympy.polys.matrices.linsolve import _linear_eq_to_dict +from sympy.polys.polyroots import UnsolvableFactorError +from sympy.simplify.simplify import simplify, fraction, trigsimp, nsimplify +from sympy.simplify import powdenest, logcombine +from sympy.functions import (log, tan, cot, sin, cos, sec, csc, exp, + acos, asin, atan, acot, acsc, asec, + piecewise_fold, Piecewise) +from sympy.functions.combinatorial.numbers import totient +from sympy.functions.elementary.complexes import Abs, arg, re, im +from sympy.functions.elementary.hyperbolic import (HyperbolicFunction, + sinh, cosh, tanh, coth, sech, csch, + asinh, acosh, atanh, acoth, asech, acsch) +from sympy.functions.elementary.miscellaneous import real_root +from sympy.functions.elementary.trigonometric import TrigonometricFunction +from sympy.logic.boolalg import And, BooleanTrue +from sympy.sets import (FiniteSet, imageset, Interval, Intersection, + Union, ConditionSet, ImageSet, Complement, Contains) +from sympy.sets.sets import Set, ProductSet +from sympy.matrices import zeros, Matrix, MatrixBase +from sympy.ntheory.factor_ import divisors +from sympy.ntheory.residue_ntheory import discrete_log, nthroot_mod +from sympy.polys import (roots, Poly, degree, together, PolynomialError, + RootOf, factor, lcm, gcd) +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.polytools import invert, groebner, poly +from sympy.polys.solvers import (sympy_eqs_to_ring, solve_lin_sys, + PolyNonlinearError) +from sympy.polys.matrices.linsolve import _linsolve +from sympy.solvers.solvers import (checksol, denoms, unrad, + _simple_dens, recast_to_symbols) +from sympy.solvers.polysys import solve_poly_system +from sympy.utilities import filldedent +from sympy.utilities.iterables import (numbered_symbols, has_dups, + is_sequence, iterable) +from sympy.calculus.util import periodicity, continuous_domain, function_range + + +from types import GeneratorType + + +class NonlinearError(ValueError): + """Raised when unexpectedly encountering nonlinear equations""" + pass + + +def _masked(f, *atoms): + """Return ``f``, with all objects given by ``atoms`` replaced with + Dummy symbols, ``d``, and the list of replacements, ``(d, e)``, + where ``e`` is an object of type given by ``atoms`` in which + any other instances of atoms have been recursively replaced with + Dummy symbols, too. The tuples are ordered so that if they are + applied in sequence, the origin ``f`` will be restored. + + Examples + ======== + + >>> from sympy import cos + >>> from sympy.abc import x + >>> from sympy.solvers.solveset import _masked + + >>> f = cos(cos(x) + 1) + >>> f, reps = _masked(cos(1 + cos(x)), cos) + >>> f + _a1 + >>> reps + [(_a1, cos(_a0 + 1)), (_a0, cos(x))] + >>> for d, e in reps: + ... f = f.xreplace({d: e}) + >>> f + cos(cos(x) + 1) + """ + sym = numbered_symbols('a', cls=Dummy, real=True) + mask = [] + for a in ordered(f.atoms(*atoms)): + for i in mask: + a = a.replace(*i) + mask.append((a, next(sym))) + for i, (o, n) in enumerate(mask): + f = f.replace(o, n) + mask[i] = (n, o) + mask = list(reversed(mask)) + return f, mask + + +def _invert(f_x, y, x, domain=S.Complexes): + r""" + Reduce the complex valued equation $f(x) = y$ to a set of equations + + $$\left\{g(x) = h_1(y),\ g(x) = h_2(y),\ \dots,\ g(x) = h_n(y) \right\}$$ + + where $g(x)$ is a simpler function than $f(x)$. The return value is a tuple + $(g(x), \mathrm{set}_h)$, where $g(x)$ is a function of $x$ and $\mathrm{set}_h$ is + the set of function $\left\{h_1(y), h_2(y), \dots, h_n(y)\right\}$. + Here, $y$ is not necessarily a symbol. + + $\mathrm{set}_h$ contains the functions, along with the information + about the domain in which they are valid, through set + operations. For instance, if :math:`y = |x| - n` is inverted + in the real domain, then $\mathrm{set}_h$ is not simply + $\{-n, n\}$ as the nature of `n` is unknown; rather, it is: + + $$ \left(\left[0, \infty\right) \cap \left\{n\right\}\right) \cup + \left(\left(-\infty, 0\right] \cap \left\{- n\right\}\right)$$ + + By default, the complex domain is used which means that inverting even + seemingly simple functions like $\exp(x)$ will give very different + results from those obtained in the real domain. + (In the case of $\exp(x)$, the inversion via $\log$ is multi-valued + in the complex domain, having infinitely many branches.) + + If you are working with real values only (or you are not sure which + function to use) you should probably set the domain to + ``S.Reals`` (or use ``invert_real`` which does that automatically). + + + Examples + ======== + + >>> from sympy.solvers.solveset import invert_complex, invert_real + >>> from sympy.abc import x, y + >>> from sympy import exp + + When does exp(x) == y? + + >>> invert_complex(exp(x), y, x) + (x, ImageSet(Lambda(_n, I*(2*_n*pi + arg(y)) + log(Abs(y))), Integers)) + >>> invert_real(exp(x), y, x) + (x, Intersection({log(y)}, Reals)) + + When does exp(x) == 1? + + >>> invert_complex(exp(x), 1, x) + (x, ImageSet(Lambda(_n, 2*_n*I*pi), Integers)) + >>> invert_real(exp(x), 1, x) + (x, {0}) + + See Also + ======== + invert_real, invert_complex + """ + x = sympify(x) + if not x.is_Symbol: + raise ValueError("x must be a symbol") + f_x = sympify(f_x) + if x not in f_x.free_symbols: + raise ValueError("Inverse of constant function doesn't exist") + y = sympify(y) + if x in y.free_symbols: + raise ValueError("y should be independent of x ") + + if domain.is_subset(S.Reals): + x1, s = _invert_real(f_x, FiniteSet(y), x) + else: + x1, s = _invert_complex(f_x, FiniteSet(y), x) + + # f couldn't be inverted completely; return unmodified. + if x1 != x: + return x1, s + + # Avoid adding gratuitous intersections with S.Complexes. Actual + # conditions should be handled by the respective inverters. + if domain is S.Complexes: + return x1, s + + if isinstance(s, FiniteSet): + return x1, s.intersect(domain) + + # "Fancier" solution sets like those obtained by inversion of trigonometric + # functions already include general validity conditions (i.e. conditions on + # the domain of the respective inverse functions), so we should avoid adding + # blanket intersections with S.Reals. But subsets of R (or C) must still be + # accounted for. + if domain is S.Reals: + return x1, s + else: + return x1, s.intersect(domain) + + +invert_complex = _invert + + +def invert_real(f_x, y, x): + """ + Inverts a real-valued function. Same as :func:`invert_complex`, but sets + the domain to ``S.Reals`` before inverting. + """ + return _invert(f_x, y, x, S.Reals) + + +def _invert_real(f, g_ys, symbol): + """Helper function for _invert.""" + + if f == symbol or g_ys is S.EmptySet: + return (symbol, g_ys) + + n = Dummy('n', real=True) + + if isinstance(f, exp) or (f.is_Pow and f.base == S.Exp1): + return _invert_real(f.exp, + imageset(Lambda(n, log(n)), g_ys), + symbol) + + if hasattr(f, 'inverse') and f.inverse() is not None and not isinstance(f, ( + TrigonometricFunction, + HyperbolicFunction, + )): + if len(f.args) > 1: + raise ValueError("Only functions with one argument are supported.") + return _invert_real(f.args[0], + imageset(Lambda(n, f.inverse()(n)), g_ys), + symbol) + + if isinstance(f, Abs): + return _invert_abs(f.args[0], g_ys, symbol) + + if f.is_Add: + # f = g + h + g, h = f.as_independent(symbol) + if g is not S.Zero: + return _invert_real(h, imageset(Lambda(n, n - g), g_ys), symbol) + + if f.is_Mul: + # f = g*h + g, h = f.as_independent(symbol) + + if g is not S.One: + return _invert_real(h, imageset(Lambda(n, n/g), g_ys), symbol) + + if f.is_Pow: + base, expo = f.args + base_has_sym = base.has(symbol) + expo_has_sym = expo.has(symbol) + + if not expo_has_sym: + + if expo.is_rational: + num, den = expo.as_numer_denom() + + if den % 2 == 0 and num % 2 == 1 and den.is_zero is False: + # Here we have f(x)**(num/den) = y + # where den is nonzero and even and y is an element + # of the set g_ys. + # den is even, so we are only interested in the cases + # where both f(x) and y are positive. + # Restricting y to be positive (using the set g_ys_pos) + # means that y**(den/num) is always positive. + # Therefore it isn't necessary to also constrain f(x) + # to be positive because we are only going to + # find solutions of f(x) = y**(d/n) + # where the rhs is already required to be positive. + root = Lambda(n, real_root(n, expo)) + g_ys_pos = g_ys & Interval(0, oo) + res = imageset(root, g_ys_pos) + _inv, _set = _invert_real(base, res, symbol) + return (_inv, _set) + + if den % 2 == 1: + root = Lambda(n, real_root(n, expo)) + res = imageset(root, g_ys) + if num % 2 == 0: + neg_res = imageset(Lambda(n, -n), res) + return _invert_real(base, res + neg_res, symbol) + if num % 2 == 1: + return _invert_real(base, res, symbol) + + elif expo.is_irrational: + root = Lambda(n, real_root(n, expo)) + g_ys_pos = g_ys & Interval(0, oo) + res = imageset(root, g_ys_pos) + return _invert_real(base, res, symbol) + + else: + # indeterminate exponent, e.g. Float or parity of + # num, den of rational could not be determined + pass # use default return + + if not base_has_sym: + rhs = g_ys.args[0] + if base.is_positive: + return _invert_real(expo, + imageset(Lambda(n, log(n, base, evaluate=False)), g_ys), symbol) + elif base.is_negative: + s, b = integer_log(rhs, base) + if b: + return _invert_real(expo, FiniteSet(s), symbol) + else: + return (expo, S.EmptySet) + elif base.is_zero: + one = Eq(rhs, 1) + if one == S.true: + # special case: 0**x - 1 + return _invert_real(expo, FiniteSet(0), symbol) + elif one == S.false: + return (expo, S.EmptySet) + + if isinstance(f, (TrigonometricFunction, HyperbolicFunction)): + return _invert_trig_hyp_real(f, g_ys, symbol) + + return (f, g_ys) + + +# Dictionaries of inverses will be cached after first use. +_trig_inverses = None +_hyp_inverses = None + +def _invert_trig_hyp_real(f, g_ys, symbol): + """Helper function for inverting trigonometric and hyperbolic functions. + + This helper only handles inversion over the reals. + + For trigonometric functions only finite `g_ys` sets are implemented. + + For hyperbolic functions the set `g_ys` is checked against the domain of the + respective inverse functions. Infinite `g_ys` sets are also supported. + """ + + if isinstance(f, HyperbolicFunction): + n = Dummy('n', real=True) + + if isinstance(f, sinh): + # asinh is defined over R. + return _invert_real(f.args[0], imageset(n, asinh(n), g_ys), symbol) + + if isinstance(f, cosh): + g_ys_dom = g_ys.intersect(Interval(1, oo)) + if isinstance(g_ys_dom, Intersection): + # could not properly resolve domain check + if isinstance(g_ys, FiniteSet): + # If g_ys is a `FiniteSet`` it should be sufficient to just + # let the calling `_invert_real()` add an intersection with + # `S.Reals` (or a subset `domain`) to ensure that only valid + # (real) solutions are returned. + # This avoids adding "too many" Intersections or + # ConditionSets in the returned set. + g_ys_dom = g_ys + else: + return (f, g_ys) + return _invert_real(f.args[0], Union( + imageset(n, acosh(n), g_ys_dom), + imageset(n, -acosh(n), g_ys_dom)), symbol) + + if isinstance(f, sech): + g_ys_dom = g_ys.intersect(Interval.Lopen(0, 1)) + if isinstance(g_ys_dom, Intersection): + if isinstance(g_ys, FiniteSet): + g_ys_dom = g_ys + else: + return (f, g_ys) + return _invert_real(f.args[0], Union( + imageset(n, asech(n), g_ys_dom), + imageset(n, -asech(n), g_ys_dom)), symbol) + + if isinstance(f, tanh): + g_ys_dom = g_ys.intersect(Interval.open(-1, 1)) + if isinstance(g_ys_dom, Intersection): + if isinstance(g_ys, FiniteSet): + g_ys_dom = g_ys + else: + return (f, g_ys) + return _invert_real(f.args[0], + imageset(n, atanh(n), g_ys_dom), symbol) + + if isinstance(f, coth): + g_ys_dom = g_ys - Interval(-1, 1) + if isinstance(g_ys_dom, Complement): + if isinstance(g_ys, FiniteSet): + g_ys_dom = g_ys + else: + return (f, g_ys) + return _invert_real(f.args[0], + imageset(n, acoth(n), g_ys_dom), symbol) + + if isinstance(f, csch): + g_ys_dom = g_ys - FiniteSet(0) + if isinstance(g_ys_dom, Complement): + if isinstance(g_ys, FiniteSet): + g_ys_dom = g_ys + else: + return (f, g_ys) + return _invert_real(f.args[0], + imageset(n, acsch(n), g_ys_dom), symbol) + + elif isinstance(f, TrigonometricFunction) and isinstance(g_ys, FiniteSet): + def _get_trig_inverses(func): + global _trig_inverses + if _trig_inverses is None: + _trig_inverses = { + sin : ((asin, lambda y: pi-asin(y)), 2*pi, Interval(-1, 1)), + cos : ((acos, lambda y: -acos(y)), 2*pi, Interval(-1, 1)), + tan : ((atan,), pi, S.Reals), + cot : ((acot,), pi, S.Reals), + sec : ((asec, lambda y: -asec(y)), 2*pi, + Union(Interval(-oo, -1), Interval(1, oo))), + csc : ((acsc, lambda y: pi-acsc(y)), 2*pi, + Union(Interval(-oo, -1), Interval(1, oo)))} + return _trig_inverses[func] + + invs, period, rng = _get_trig_inverses(f.func) + n = Dummy('n', integer=True) + def create_return_set(g): + # returns ConditionSet that will be part of the final (x, set) tuple + invsimg = Union(*[ + imageset(n, period*n + inv(g), S.Integers) for inv in invs]) + inv_f, inv_g_ys = _invert_real(f.args[0], invsimg, symbol) + if inv_f == symbol: # inversion successful + conds = rng.contains(g) + return ConditionSet(symbol, conds, inv_g_ys) + else: + return ConditionSet(symbol, Eq(f, g), S.Reals) + + retset = Union(*[create_return_set(g) for g in g_ys]) + return (symbol, retset) + + else: + return (f, g_ys) + + +def _invert_trig_hyp_complex(f, g_ys, symbol): + """Helper function for inverting trigonometric and hyperbolic functions. + + This helper only handles inversion over the complex numbers. + Only finite `g_ys` sets are implemented. + + Handling of singularities is only implemented for hyperbolic equations. + In case of a symbolic element g in g_ys a ConditionSet may be returned. + """ + + if isinstance(f, TrigonometricFunction) and isinstance(g_ys, FiniteSet): + def inv(trig): + if isinstance(trig, (sin, csc)): + F = asin if isinstance(trig, sin) else acsc + return ( + lambda a: 2*n*pi + F(a), + lambda a: 2*n*pi + pi - F(a)) + if isinstance(trig, (cos, sec)): + F = acos if isinstance(trig, cos) else asec + return ( + lambda a: 2*n*pi + F(a), + lambda a: 2*n*pi - F(a)) + if isinstance(trig, (tan, cot)): + return (lambda a: n*pi + trig.inverse()(a),) + + n = Dummy('n', integer=True) + invs = S.EmptySet + for L in inv(f): + invs += Union(*[imageset(Lambda(n, L(g)), S.Integers) for g in g_ys]) + return _invert_complex(f.args[0], invs, symbol) + + elif isinstance(f, HyperbolicFunction) and isinstance(g_ys, FiniteSet): + # There are two main options regarding singularities / domain checking + # for symbolic elements in g_ys: + # 1. Add a "catch-all" intersection with S.Complexes. + # 2. ConditionSets. + # At present ConditionSets seem to work better and have the additional + # benefit of representing the precise conditions that must be satisfied. + # The conditions are also rather straightforward. (At most two isolated + # points.) + def _get_hyp_inverses(func): + global _hyp_inverses + if _hyp_inverses is None: + _hyp_inverses = { + sinh : ((asinh, lambda y: I*pi-asinh(y)), 2*I*pi, ()), + cosh : ((acosh, lambda y: -acosh(y)), 2*I*pi, ()), + tanh : ((atanh,), I*pi, (-1, 1)), + coth : ((acoth,), I*pi, (-1, 1)), + sech : ((asech, lambda y: -asech(y)), 2*I*pi, (0, )), + csch : ((acsch, lambda y: I*pi-acsch(y)), 2*I*pi, (0, ))} + return _hyp_inverses[func] + + # invs: iterable of main inverses, e.g. (acosh, -acosh). + # excl: iterable of singularities to be checked for. + invs, period, excl = _get_hyp_inverses(f.func) + n = Dummy('n', integer=True) + def create_return_set(g): + # returns ConditionSet that will be part of the final (x, set) tuple + invsimg = Union(*[ + imageset(n, period*n + inv(g), S.Integers) for inv in invs]) + inv_f, inv_g_ys = _invert_complex(f.args[0], invsimg, symbol) + if inv_f == symbol: # inversion successful + conds = And(*[Ne(g, e) for e in excl]) + return ConditionSet(symbol, conds, inv_g_ys) + else: + return ConditionSet(symbol, Eq(f, g), S.Complexes) + + retset = Union(*[create_return_set(g) for g in g_ys]) + return (symbol, retset) + + else: + return (f, g_ys) + + +def _invert_complex(f, g_ys, symbol): + """Helper function for _invert.""" + + if f == symbol or g_ys is S.EmptySet: + return (symbol, g_ys) + + n = Dummy('n') + + if f.is_Add: + # f = g + h + g, h = f.as_independent(symbol) + if g is not S.Zero: + return _invert_complex(h, imageset(Lambda(n, n - g), g_ys), symbol) + + if f.is_Mul: + # f = g*h + g, h = f.as_independent(symbol) + + if g is not S.One: + if g in {S.NegativeInfinity, S.ComplexInfinity, S.Infinity}: + return (h, S.EmptySet) + return _invert_complex(h, imageset(Lambda(n, n/g), g_ys), symbol) + + if f.is_Pow: + base, expo = f.args + # special case: g**r = 0 + # Could be improved like `_invert_real` to handle more general cases. + if expo.is_Rational and g_ys == FiniteSet(0): + if expo.is_positive: + return _invert_complex(base, g_ys, symbol) + + if hasattr(f, 'inverse') and f.inverse() is not None and \ + not isinstance(f, TrigonometricFunction) and \ + not isinstance(f, HyperbolicFunction) and \ + not isinstance(f, exp): + if len(f.args) > 1: + raise ValueError("Only functions with one argument are supported.") + return _invert_complex(f.args[0], + imageset(Lambda(n, f.inverse()(n)), g_ys), symbol) + + if isinstance(f, exp) or (f.is_Pow and f.base == S.Exp1): + if isinstance(g_ys, ImageSet): + # can solve up to `(d*exp(exp(...(exp(a*x + b))...) + c)` format. + # Further can be improved to `(d*exp(exp(...(exp(a*x**n + b*x**(n-1) + ... + f))...) + c)`. + g_ys_expr = g_ys.lamda.expr + g_ys_vars = g_ys.lamda.variables + k = Dummy('k{}'.format(len(g_ys_vars))) + g_ys_vars_1 = (k,) + g_ys_vars + exp_invs = Union(*[imageset(Lambda((g_ys_vars_1,), (I*(2*k*pi + arg(g_ys_expr)) + + log(Abs(g_ys_expr)))), S.Integers**(len(g_ys_vars_1)))]) + return _invert_complex(f.exp, exp_invs, symbol) + + elif isinstance(g_ys, FiniteSet): + exp_invs = Union(*[imageset(Lambda(n, I*(2*n*pi + arg(g_y)) + + log(Abs(g_y))), S.Integers) + for g_y in g_ys if g_y != 0]) + return _invert_complex(f.exp, exp_invs, symbol) + + if isinstance(f, (TrigonometricFunction, HyperbolicFunction)): + return _invert_trig_hyp_complex(f, g_ys, symbol) + + return (f, g_ys) + + +def _invert_abs(f, g_ys, symbol): + """Helper function for inverting absolute value functions. + + Returns the complete result of inverting an absolute value + function along with the conditions which must also be satisfied. + + If it is certain that all these conditions are met, a :class:`~.FiniteSet` + of all possible solutions is returned. If any condition cannot be + satisfied, an :class:`~.EmptySet` is returned. Otherwise, a + :class:`~.ConditionSet` of the solutions, with all the required conditions + specified, is returned. + + """ + if not g_ys.is_FiniteSet: + # this could be used for FiniteSet, but the + # results are more compact if they aren't, e.g. + # ConditionSet(x, Contains(n, Interval(0, oo)), {-n, n}) vs + # Union(Intersection(Interval(0, oo), {n}), Intersection(Interval(-oo, 0), {-n})) + # for the solution of abs(x) - n + pos = Intersection(g_ys, Interval(0, S.Infinity)) + parg = _invert_real(f, pos, symbol) + narg = _invert_real(-f, pos, symbol) + if parg[0] != narg[0]: + raise NotImplementedError + return parg[0], Union(narg[1], parg[1]) + + # check conditions: all these must be true. If any are unknown + # then return them as conditions which must be satisfied + unknown = [] + for a in g_ys.args: + ok = a.is_nonnegative if a.is_Number else a.is_positive + if ok is None: + unknown.append(a) + elif not ok: + return symbol, S.EmptySet + if unknown: + conditions = And(*[Contains(i, Interval(0, oo)) + for i in unknown]) + else: + conditions = True + n = Dummy('n', real=True) + # this is slightly different than above: instead of solving + # +/-f on positive values, here we solve for f on +/- g_ys + g_x, values = _invert_real(f, Union( + imageset(Lambda(n, n), g_ys), + imageset(Lambda(n, -n), g_ys)), symbol) + return g_x, ConditionSet(g_x, conditions, values) + + +def domain_check(f, symbol, p): + """Returns False if point p is infinite or any subexpression of f + is infinite or becomes so after replacing symbol with p. If none of + these conditions is met then True will be returned. + + Examples + ======== + + >>> from sympy import Mul, oo + >>> from sympy.abc import x + >>> from sympy.solvers.solveset import domain_check + >>> g = 1/(1 + (1/(x + 1))**2) + >>> domain_check(g, x, -1) + False + >>> domain_check(x**2, x, 0) + True + >>> domain_check(1/x, x, oo) + False + + * The function relies on the assumption that the original form + of the equation has not been changed by automatic simplification. + + >>> domain_check(x/x, x, 0) # x/x is automatically simplified to 1 + True + + * To deal with automatic evaluations use evaluate=False: + + >>> domain_check(Mul(x, 1/x, evaluate=False), x, 0) + False + """ + f, p = sympify(f), sympify(p) + if p.is_infinite: + return False + return _domain_check(f, symbol, p) + + +def _domain_check(f, symbol, p): + # helper for domain check + if f.is_Atom and f.is_finite: + return True + elif f.subs(symbol, p).is_infinite: + return False + elif isinstance(f, Piecewise): + # Check the cases of the Piecewise in turn. There might be invalid + # expressions in later cases that don't apply e.g. + # solveset(Piecewise((0, Eq(x, 0)), (1/x, True)), x) + for expr, cond in f.args: + condsubs = cond.subs(symbol, p) + if condsubs is S.false: + continue + elif condsubs is S.true: + return _domain_check(expr, symbol, p) + else: + # We don't know which case of the Piecewise holds. On this + # basis we cannot decide whether any solution is in or out of + # the domain. Ideally this function would allow returning a + # symbolic condition for the validity of the solution that + # could be handled in the calling code. In the mean time we'll + # give this particular solution the benefit of the doubt and + # let it pass. + return True + else: + # TODO : We should not blindly recurse through all args of arbitrary expressions like this + return all(_domain_check(g, symbol, p) + for g in f.args) + + +def _is_finite_with_finite_vars(f, domain=S.Complexes): + """ + Return True if the given expression is finite. For symbols that + do not assign a value for `complex` and/or `real`, the domain will + be used to assign a value; symbols that do not assign a value + for `finite` will be made finite. All other assumptions are + left unmodified. + """ + def assumptions(s): + A = s.assumptions0 + A.setdefault('finite', A.get('finite', True)) + if domain.is_subset(S.Reals): + # if this gets set it will make complex=True, too + A.setdefault('real', True) + else: + # don't change 'real' because being complex implies + # nothing about being real + A.setdefault('complex', True) + return A + + reps = {s: Dummy(**assumptions(s)) for s in f.free_symbols} + return f.xreplace(reps).is_finite + + +def _is_function_class_equation(func_class, f, symbol): + """ Tests whether the equation is an equation of the given function class. + + The given equation belongs to the given function class if it is + comprised of functions of the function class which are multiplied by + or added to expressions independent of the symbol. In addition, the + arguments of all such functions must be linear in the symbol as well. + + Examples + ======== + + >>> from sympy.solvers.solveset import _is_function_class_equation + >>> from sympy import tan, sin, tanh, sinh, exp + >>> from sympy.abc import x + >>> from sympy.functions.elementary.trigonometric import TrigonometricFunction + >>> from sympy.functions.elementary.hyperbolic import HyperbolicFunction + >>> _is_function_class_equation(TrigonometricFunction, exp(x) + tan(x), x) + False + >>> _is_function_class_equation(TrigonometricFunction, tan(x) + sin(x), x) + True + >>> _is_function_class_equation(TrigonometricFunction, tan(x**2), x) + False + >>> _is_function_class_equation(TrigonometricFunction, tan(x + 2), x) + True + >>> _is_function_class_equation(HyperbolicFunction, tanh(x) + sinh(x), x) + True + """ + if f.is_Mul or f.is_Add: + return all(_is_function_class_equation(func_class, arg, symbol) + for arg in f.args) + + if f.is_Pow: + if not f.exp.has(symbol): + return _is_function_class_equation(func_class, f.base, symbol) + else: + return False + + if not f.has(symbol): + return True + + if isinstance(f, func_class): + try: + g = Poly(f.args[0], symbol) + return g.degree() <= 1 + except PolynomialError: + return False + else: + return False + + +def _solve_as_rational(f, symbol, domain): + """ solve rational functions""" + f = together(_mexpand(f, recursive=True), deep=True) + g, h = fraction(f) + if not h.has(symbol): + try: + return _solve_as_poly(g, symbol, domain) + except NotImplementedError: + # The polynomial formed from g could end up having + # coefficients in a ring over which finding roots + # isn't implemented yet, e.g. ZZ[a] for some symbol a + return ConditionSet(symbol, Eq(f, 0), domain) + except CoercionFailed: + # contained oo, zoo or nan + return S.EmptySet + else: + valid_solns = _solveset(g, symbol, domain) + invalid_solns = _solveset(h, symbol, domain) + return valid_solns - invalid_solns + + +class _SolveTrig1Error(Exception): + """Raised when _solve_trig1 heuristics do not apply""" + +def _solve_trig(f, symbol, domain): + """Function to call other helpers to solve trigonometric equations """ + # If f is composed of a single trig function (potentially appearing multiple + # times) we should solve by either inverting directly or inverting after a + # suitable change of variable. + # + # _solve_trig is currently only called by _solveset for trig/hyperbolic + # functions of an argument linear in x. Inverting a symbolic argument should + # include a guard against division by zero in order to have a result that is + # consistent with similar processing done by _solve_trig1. + # (Ideally _invert should add these conditions by itself.) + trig_expr, count = None, 0 + for expr in preorder_traversal(f): + if isinstance(expr, (TrigonometricFunction, + HyperbolicFunction)) and expr.has(symbol): + if not trig_expr: + trig_expr, count = expr, 1 + elif expr == trig_expr: + count += 1 + else: + trig_expr, count = False, 0 + break + if count == 1: + # direct inversion + x, sol = _invert(f, 0, symbol, domain) + if x == symbol: + cond = True + if trig_expr.free_symbols - {symbol}: + a, h = trig_expr.args[0].as_independent(symbol, as_Add=True) + m, h = h.as_independent(symbol, as_Add=False) + num, den = m.as_numer_denom() + cond = Ne(num, 0) & Ne(den, 0) + return ConditionSet(symbol, cond, sol) + else: + return ConditionSet(symbol, Eq(f, 0), domain) + elif count: + # solve by change of variable + y = Dummy('y') + f_cov = f.subs(trig_expr, y) + sol_cov = solveset(f_cov, y, domain) + if isinstance(sol_cov, FiniteSet): + return Union( + *[_solve_trig(trig_expr-s, symbol, domain) for s in sol_cov]) + + sol = None + try: + # multiple trig/hyp functions; solve by rewriting to exp + sol = _solve_trig1(f, symbol, domain) + except _SolveTrig1Error: + try: + # multiple trig/hyp functions; solve by rewriting to tan(x/2) + sol = _solve_trig2(f, symbol, domain) + except ValueError: + raise NotImplementedError(filldedent(''' + Solution to this kind of trigonometric equations + is yet to be implemented''')) + return sol + + +def _solve_trig1(f, symbol, domain): + """Primary solver for trigonometric and hyperbolic equations + + Returns either the solution set as a ConditionSet (auto-evaluated to a + union of ImageSets if no variables besides 'symbol' are involved) or + raises _SolveTrig1Error if f == 0 cannot be solved. + + Notes + ===== + Algorithm: + 1. Do a change of variable x -> mu*x in arguments to trigonometric and + hyperbolic functions, in order to reduce them to small integers. (This + step is crucial to keep the degrees of the polynomials of step 4 low.) + 2. Rewrite trigonometric/hyperbolic functions as exponentials. + 3. Proceed to a 2nd change of variable, replacing exp(I*x) or exp(x) by y. + 4. Solve the resulting rational equation. + 5. Use invert_complex or invert_real to return to the original variable. + 6. If the coefficients of 'symbol' were symbolic in nature, add the + necessary consistency conditions in a ConditionSet. + + """ + # Prepare change of variable + x = Dummy('x') + if _is_function_class_equation(HyperbolicFunction, f, symbol): + cov = exp(x) + inverter = invert_real if domain.is_subset(S.Reals) else invert_complex + else: + cov = exp(I*x) + inverter = invert_complex + + f = trigsimp(f) + f_original = f + trig_functions = f.atoms(TrigonometricFunction, HyperbolicFunction) + trig_arguments = [e.args[0] for e in trig_functions] + # trigsimp may have reduced the equation to an expression + # that is independent of 'symbol' (e.g. cos**2+sin**2) + if not any(a.has(symbol) for a in trig_arguments): + return solveset(f_original, symbol, domain) + + denominators = [] + numerators = [] + for ar in trig_arguments: + try: + poly_ar = Poly(ar, symbol) + except PolynomialError: + raise _SolveTrig1Error("trig argument is not a polynomial") + if poly_ar.degree() > 1: # degree >1 still bad + raise _SolveTrig1Error("degree of variable must not exceed one") + if poly_ar.degree() == 0: # degree 0, don't care + continue + c = poly_ar.all_coeffs()[0] # got the coefficient of 'symbol' + numerators.append(fraction(c)[0]) + denominators.append(fraction(c)[1]) + + mu = lcm(denominators)/gcd(numerators) + f = f.subs(symbol, mu*x) + f = f.rewrite(exp) + f = together(f) + g, h = fraction(f) + y = Dummy('y') + g, h = g.expand(), h.expand() + g, h = g.subs(cov, y), h.subs(cov, y) + if g.has(x) or h.has(x): + raise _SolveTrig1Error("change of variable not possible") + + solns = solveset_complex(g, y) - solveset_complex(h, y) + if isinstance(solns, ConditionSet): + raise _SolveTrig1Error("polynomial has ConditionSet solution") + + if isinstance(solns, FiniteSet): + if any(isinstance(s, RootOf) for s in solns): + raise _SolveTrig1Error("polynomial results in RootOf object") + # revert the change of variable + cov = cov.subs(x, symbol/mu) + result = Union(*[inverter(cov, s, symbol)[1] for s in solns]) + # In case of symbolic coefficients, the solution set is only valid + # if numerator and denominator of mu are non-zero. + if mu.has(Symbol): + syms = (mu).atoms(Symbol) + munum, muden = fraction(mu) + condnum = munum.as_independent(*syms, as_Add=False)[1] + condden = muden.as_independent(*syms, as_Add=False)[1] + cond = And(Ne(condnum, 0), Ne(condden, 0)) + else: + cond = True + # Actual conditions are returned as part of the ConditionSet. Adding an + # intersection with C would only complicate some solution sets due to + # current limitations of intersection code. (e.g. #19154) + if domain is S.Complexes: + # This is a slight abuse of ConditionSet. Ideally this should + # be some kind of "PiecewiseSet". (See #19507 discussion) + return ConditionSet(symbol, cond, result) + else: + return ConditionSet(symbol, cond, Intersection(result, domain)) + elif solns is S.EmptySet: + return S.EmptySet + else: + raise _SolveTrig1Error("polynomial solutions must form FiniteSet") + + +def _solve_trig2(f, symbol, domain): + """Secondary helper to solve trigonometric equations, + called when first helper fails """ + f = trigsimp(f) + f_original = f + trig_functions = f.atoms(sin, cos, tan, sec, cot, csc) + trig_arguments = [e.args[0] for e in trig_functions] + denominators = [] + numerators = [] + + # todo: This solver can be extended to hyperbolics if the + # analogous change of variable to tanh (instead of tan) + # is used. + if not trig_functions: + return ConditionSet(symbol, Eq(f_original, 0), domain) + + # todo: The pre-processing below (extraction of numerators, denominators, + # gcd, lcm, mu, etc.) should be updated to the enhanced version in + # _solve_trig1. (See #19507) + for ar in trig_arguments: + try: + poly_ar = Poly(ar, symbol) + except PolynomialError: + raise ValueError("give up, we cannot solve if this is not a polynomial in x") + if poly_ar.degree() > 1: # degree >1 still bad + raise ValueError("degree of variable inside polynomial should not exceed one") + if poly_ar.degree() == 0: # degree 0, don't care + continue + c = poly_ar.all_coeffs()[0] # got the coefficient of 'symbol' + try: + numerators.append(Rational(c).p) + denominators.append(Rational(c).q) + except TypeError: + return ConditionSet(symbol, Eq(f_original, 0), domain) + + x = Dummy('x') + + mu = Rational(2)*number_lcm(*denominators)/number_gcd(*numerators) + f = f.subs(symbol, mu*x) + f = f.rewrite(tan) + f = expand_trig(f) + f = together(f) + + g, h = fraction(f) + y = Dummy('y') + g, h = g.expand(), h.expand() + g, h = g.subs(tan(x), y), h.subs(tan(x), y) + + if g.has(x) or h.has(x): + return ConditionSet(symbol, Eq(f_original, 0), domain) + solns = solveset(g, y, S.Reals) - solveset(h, y, S.Reals) + + if isinstance(solns, FiniteSet): + result = Union(*[invert_real(tan(symbol/mu), s, symbol)[1] + for s in solns]) + dsol = invert_real(tan(symbol/mu), oo, symbol)[1] + if degree(h) > degree(g): # If degree(denom)>degree(num) then there + result = Union(result, dsol) # would be another sol at Lim(denom-->oo) + return Intersection(result, domain) + elif solns is S.EmptySet: + return S.EmptySet + else: + return ConditionSet(symbol, Eq(f_original, 0), S.Reals) + + +def _solve_as_poly(f, symbol, domain=S.Complexes): + """ + Solve the equation using polynomial techniques if it already is a + polynomial equation or, with a change of variables, can be made so. + """ + result = None + if f.is_polynomial(symbol): + solns = roots(f, symbol, cubics=True, quartics=True, + quintics=True, domain='EX') + num_roots = sum(solns.values()) + if degree(f, symbol) <= num_roots: + result = FiniteSet(*solns.keys()) + else: + poly = Poly(f, symbol) + solns = poly.all_roots() + if poly.degree() <= len(solns): + result = FiniteSet(*solns) + else: + result = ConditionSet(symbol, Eq(f, 0), domain) + else: + poly = Poly(f) + if poly is None: + result = ConditionSet(symbol, Eq(f, 0), domain) + gens = [g for g in poly.gens if g.has(symbol)] + + if len(gens) == 1: + poly = Poly(poly, gens[0]) + gen = poly.gen + deg = poly.degree() + poly = Poly(poly.as_expr(), poly.gen, composite=True) + poly_solns = FiniteSet(*roots(poly, cubics=True, quartics=True, + quintics=True).keys()) + + if len(poly_solns) < deg: + result = ConditionSet(symbol, Eq(f, 0), domain) + + if gen != symbol: + y = Dummy('y') + inverter = invert_real if domain.is_subset(S.Reals) else invert_complex + lhs, rhs_s = inverter(gen, y, symbol) + if lhs == symbol: + result = Union(*[rhs_s.subs(y, s) for s in poly_solns]) + if isinstance(result, FiniteSet) and isinstance(gen, Pow + ) and gen.base.is_Rational: + result = FiniteSet(*[expand_log(i) for i in result]) + else: + result = ConditionSet(symbol, Eq(f, 0), domain) + else: + result = ConditionSet(symbol, Eq(f, 0), domain) + + if result is not None: + if isinstance(result, FiniteSet): + # this is to simplify solutions like -sqrt(-I) to sqrt(2)/2 + # - sqrt(2)*I/2. We are not expanding for solution with symbols + # or undefined functions because that makes the solution more complicated. + # For example, expand_complex(a) returns re(a) + I*im(a) + if all(s.atoms(Symbol, AppliedUndef) == set() and not isinstance(s, RootOf) + for s in result): + s = Dummy('s') + result = imageset(Lambda(s, expand_complex(s)), result) + if isinstance(result, FiniteSet) and domain != S.Complexes: + # Avoid adding gratuitous intersections with S.Complexes. Actual + # conditions should be handled elsewhere. + result = result.intersection(domain) + return result + else: + return ConditionSet(symbol, Eq(f, 0), domain) + + +def _solve_radical(f, unradf, symbol, solveset_solver): + """ Helper function to solve equations with radicals """ + res = unradf + eq, cov = res if res else (f, []) + if not cov: + result = solveset_solver(eq, symbol) - \ + Union(*[solveset_solver(g, symbol) for g in denoms(f, symbol)]) + else: + y, yeq = cov + if not solveset_solver(y - I, y): + yreal = Dummy('yreal', real=True) + yeq = yeq.xreplace({y: yreal}) + eq = eq.xreplace({y: yreal}) + y = yreal + g_y_s = solveset_solver(yeq, symbol) + f_y_sols = solveset_solver(eq, y) + result = Union(*[imageset(Lambda(y, g_y), f_y_sols) + for g_y in g_y_s]) + + def check_finiteset(solutions): + f_set = [] # solutions for FiniteSet + c_set = [] # solutions for ConditionSet + for s in solutions: + if checksol(f, symbol, s): + f_set.append(s) + else: + c_set.append(s) + return FiniteSet(*f_set) + ConditionSet(symbol, Eq(f, 0), FiniteSet(*c_set)) + + def check_set(solutions): + if solutions is S.EmptySet: + return solutions + elif isinstance(solutions, ConditionSet): + # XXX: Maybe the base set should be checked? + return solutions + elif isinstance(solutions, FiniteSet): + return check_finiteset(solutions) + elif isinstance(solutions, Complement): + A, B = solutions.args + return Complement(check_set(A), B) + elif isinstance(solutions, Union): + return Union(*[check_set(s) for s in solutions.args]) + else: + # XXX: There should be more cases checked here. The cases above + # are all those that come up in the test suite for now. + return solutions + + solution_set = check_set(result) + + return solution_set + + +def _solve_abs(f, symbol, domain): + """ Helper function to solve equation involving absolute value function """ + if not domain.is_subset(S.Reals): + raise ValueError(filldedent(''' + Absolute values cannot be inverted in the + complex domain.''')) + p, q, r = Wild('p'), Wild('q'), Wild('r') + pattern_match = f.match(p*Abs(q) + r) or {} + f_p, f_q, f_r = [pattern_match.get(i, S.Zero) for i in (p, q, r)] + + if not (f_p.is_zero or f_q.is_zero): + domain = continuous_domain(f_q, symbol, domain) + from .inequalities import solve_univariate_inequality + q_pos_cond = solve_univariate_inequality(f_q >= 0, symbol, + relational=False, domain=domain, continuous=True) + q_neg_cond = q_pos_cond.complement(domain) + + sols_q_pos = solveset_real(f_p*f_q + f_r, + symbol).intersect(q_pos_cond) + sols_q_neg = solveset_real(f_p*(-f_q) + f_r, + symbol).intersect(q_neg_cond) + return Union(sols_q_pos, sols_q_neg) + else: + return ConditionSet(symbol, Eq(f, 0), domain) + + +def solve_decomposition(f, symbol, domain): + """ + Function to solve equations via the principle of "Decomposition + and Rewriting". + + Examples + ======== + >>> from sympy import exp, sin, Symbol, pprint, S + >>> from sympy.solvers.solveset import solve_decomposition as sd + >>> x = Symbol('x') + >>> f1 = exp(2*x) - 3*exp(x) + 2 + >>> sd(f1, x, S.Reals) + {0, log(2)} + >>> f2 = sin(x)**2 + 2*sin(x) + 1 + >>> pprint(sd(f2, x, S.Reals), use_unicode=False) + 3*pi + {2*n*pi + ---- | n in Integers} + 2 + >>> f3 = sin(x + 2) + >>> pprint(sd(f3, x, S.Reals), use_unicode=False) + {2*n*pi - 2 | n in Integers} U {2*n*pi - 2 + pi | n in Integers} + + """ + from sympy.solvers.decompogen import decompogen + # decompose the given function + g_s = decompogen(f, symbol) + # `y_s` represents the set of values for which the function `g` is to be + # solved. + # `solutions` represent the solutions of the equations `g = y_s` or + # `g = 0` depending on the type of `y_s`. + # As we are interested in solving the equation: f = 0 + y_s = FiniteSet(0) + for g in g_s: + frange = function_range(g, symbol, domain) + y_s = Intersection(frange, y_s) + result = S.EmptySet + if isinstance(y_s, FiniteSet): + for y in y_s: + solutions = solveset(Eq(g, y), symbol, domain) + if not isinstance(solutions, ConditionSet): + result += solutions + + else: + if isinstance(y_s, ImageSet): + iter_iset = (y_s,) + + elif isinstance(y_s, Union): + iter_iset = y_s.args + + elif y_s is S.EmptySet: + # y_s is not in the range of g in g_s, so no solution exists + #in the given domain + return S.EmptySet + + for iset in iter_iset: + new_solutions = solveset(Eq(iset.lamda.expr, g), symbol, domain) + dummy_var = tuple(iset.lamda.expr.free_symbols)[0] + (base_set,) = iset.base_sets + if isinstance(new_solutions, FiniteSet): + new_exprs = new_solutions + + elif isinstance(new_solutions, Intersection): + if isinstance(new_solutions.args[1], FiniteSet): + new_exprs = new_solutions.args[1] + + for new_expr in new_exprs: + result += ImageSet(Lambda(dummy_var, new_expr), base_set) + + if result is S.EmptySet: + return ConditionSet(symbol, Eq(f, 0), domain) + + y_s = result + + return y_s + + +def _solveset(f, symbol, domain, _check=False): + """Helper for solveset to return a result from an expression + that has already been sympify'ed and is known to contain the + given symbol.""" + # _check controls whether the answer is checked or not + from sympy.simplify.simplify import signsimp + + if isinstance(f, BooleanTrue): + return domain + + orig_f = f + if f.is_Mul: + coeff, f = f.as_independent(symbol, as_Add=False) + if coeff in {S.ComplexInfinity, S.NegativeInfinity, S.Infinity}: + f = together(orig_f) + elif f.is_Add: + a, h = f.as_independent(symbol) + m, h = h.as_independent(symbol, as_Add=False) + if m not in {S.ComplexInfinity, S.Zero, S.Infinity, + S.NegativeInfinity}: + f = a/m + h # XXX condition `m != 0` should be added to soln + + # assign the solvers to use + solver = lambda f, x, domain=domain: _solveset(f, x, domain) + inverter = lambda f, rhs, symbol: _invert(f, rhs, symbol, domain) + + result = S.EmptySet + + if f.expand().is_zero: + return domain + elif not f.has(symbol): + return S.EmptySet + elif f.is_Mul and all(_is_finite_with_finite_vars(m, domain) + for m in f.args): + # if f(x) and g(x) are both finite we can say that the solution of + # f(x)*g(x) == 0 is same as Union(f(x) == 0, g(x) == 0) is not true in + # general. g(x) can grow to infinitely large for the values where + # f(x) == 0. To be sure that we are not silently allowing any + # wrong solutions we are using this technique only if both f and g are + # finite for a finite input. + result = Union(*[solver(m, symbol) for m in f.args]) + elif (_is_function_class_equation(TrigonometricFunction, f, symbol) or \ + _is_function_class_equation(HyperbolicFunction, f, symbol)): + result = _solve_trig(f, symbol, domain) + elif isinstance(f, arg): + a = f.args[0] + result = Intersection(_solveset(re(a) > 0, symbol, domain), + _solveset(im(a), symbol, domain)) + elif f.is_Piecewise: + expr_set_pairs = f.as_expr_set_pairs(domain) + for (expr, in_set) in expr_set_pairs: + if in_set.is_Relational: + in_set = in_set.as_set() + solns = solver(expr, symbol, in_set) + result += solns + elif isinstance(f, Eq): + result = solver(Add(f.lhs, -f.rhs, evaluate=False), symbol, domain) + + elif f.is_Relational: + from .inequalities import solve_univariate_inequality + try: + result = solve_univariate_inequality( + f, symbol, domain=domain, relational=False) + except NotImplementedError: + result = ConditionSet(symbol, f, domain) + return result + elif _is_modular(f, symbol): + result = _solve_modular(f, symbol, domain) + else: + lhs, rhs_s = inverter(f, 0, symbol) + if lhs == symbol: + # do some very minimal simplification since + # repeated inversion may have left the result + # in a state that other solvers (e.g. poly) + # would have simplified; this is done here + # rather than in the inverter since here it + # is only done once whereas there it would + # be repeated for each step of the inversion + if isinstance(rhs_s, FiniteSet): + rhs_s = FiniteSet(*[Mul(* + signsimp(i).as_content_primitive()) + for i in rhs_s]) + result = rhs_s + + elif isinstance(rhs_s, FiniteSet): + for equation in [lhs - rhs for rhs in rhs_s]: + if equation == f: + u = unrad(f, symbol) + if u: + result += _solve_radical(equation, u, + symbol, + solver) + elif equation.has(Abs): + result += _solve_abs(f, symbol, domain) + else: + result_rational = _solve_as_rational(equation, symbol, domain) + if not isinstance(result_rational, ConditionSet): + result += result_rational + else: + # may be a transcendental type equation + t_result = _transolve(equation, symbol, domain) + if isinstance(t_result, ConditionSet): + # might need factoring; this is expensive so we + # have delayed until now. To avoid recursion + # errors look for a non-trivial factoring into + # a product of symbol dependent terms; I think + # that something that factors as a Pow would + # have already been recognized by now. + factored = equation.factor() + if factored.is_Mul and equation != factored: + _, dep = factored.as_independent(symbol) + if not dep.is_Add: + # non-trivial factoring of equation + # but use form with constants + # in case they need special handling + t_results = [] + for fac in Mul.make_args(factored): + if fac.has(symbol): + t_results.append(solver(fac, symbol)) + t_result = Union(*t_results) + result += t_result + else: + result += solver(equation, symbol) + + elif rhs_s is not S.EmptySet: + result = ConditionSet(symbol, Eq(f, 0), domain) + + if isinstance(result, ConditionSet): + if isinstance(f, Expr): + num, den = f.as_numer_denom() + if den.has(symbol): + _result = _solveset(num, symbol, domain) + if not isinstance(_result, ConditionSet): + singularities = _solveset(den, symbol, domain) + result = _result - singularities + + if _check: + if isinstance(result, ConditionSet): + # it wasn't solved or has enumerated all conditions + # -- leave it alone + return result + + # whittle away all but the symbol-containing core + # to use this for testing + if isinstance(orig_f, Expr): + fx = orig_f.as_independent(symbol, as_Add=True)[1] + fx = fx.as_independent(symbol, as_Add=False)[1] + else: + fx = orig_f + + if isinstance(result, FiniteSet): + # check the result for invalid solutions + result = FiniteSet(*[s for s in result + if isinstance(s, RootOf) + or domain_check(fx, symbol, s)]) + + return result + + +def _is_modular(f, symbol): + """ + Helper function to check below mentioned types of modular equations. + ``A - Mod(B, C) = 0`` + + A -> This can or cannot be a function of symbol. + B -> This is surely a function of symbol. + C -> It is an integer. + + Parameters + ========== + + f : Expr + The equation to be checked. + + symbol : Symbol + The concerned variable for which the equation is to be checked. + + Examples + ======== + + >>> from sympy import symbols, exp, Mod + >>> from sympy.solvers.solveset import _is_modular as check + >>> x, y = symbols('x y') + >>> check(Mod(x, 3) - 1, x) + True + >>> check(Mod(x, 3) - 1, y) + False + >>> check(Mod(x, 3)**2 - 5, x) + False + >>> check(Mod(x, 3)**2 - y, x) + False + >>> check(exp(Mod(x, 3)) - 1, x) + False + >>> check(Mod(3, y) - 1, y) + False + """ + + if not f.has(Mod): + return False + + # extract modterms from f. + modterms = list(f.atoms(Mod)) + + return (len(modterms) == 1 and # only one Mod should be present + modterms[0].args[0].has(symbol) and # B-> function of symbol + modterms[0].args[1].is_integer and # C-> to be an integer. + any(isinstance(term, Mod) + for term in list(_term_factors(f))) # free from other funcs + ) + + +def _invert_modular(modterm, rhs, n, symbol): + """ + Helper function to invert modular equation. + ``Mod(a, m) - rhs = 0`` + + Generally it is inverted as (a, ImageSet(Lambda(n, m*n + rhs), S.Integers)). + More simplified form will be returned if possible. + + If it is not invertible then (modterm, rhs) is returned. + + The following cases arise while inverting equation ``Mod(a, m) - rhs = 0``: + + 1. If a is symbol then m*n + rhs is the required solution. + + 2. If a is an instance of ``Add`` then we try to find two symbol independent + parts of a and the symbol independent part gets transferred to the other + side and again the ``_invert_modular`` is called on the symbol + dependent part. + + 3. If a is an instance of ``Mul`` then same as we done in ``Add`` we separate + out the symbol dependent and symbol independent parts and transfer the + symbol independent part to the rhs with the help of invert and again the + ``_invert_modular`` is called on the symbol dependent part. + + 4. If a is an instance of ``Pow`` then two cases arise as following: + + - If a is of type (symbol_indep)**(symbol_dep) then the remainder is + evaluated with the help of discrete_log function and then the least + period is being found out with the help of totient function. + period*n + remainder is the required solution in this case. + For reference: (https://en.wikipedia.org/wiki/Euler's_theorem) + + - If a is of type (symbol_dep)**(symbol_indep) then we try to find all + primitive solutions list with the help of nthroot_mod function. + m*n + rem is the general solution where rem belongs to solutions list + from nthroot_mod function. + + Parameters + ========== + + modterm, rhs : Expr + The modular equation to be inverted, ``modterm - rhs = 0`` + + symbol : Symbol + The variable in the equation to be inverted. + + n : Dummy + Dummy variable for output g_n. + + Returns + ======= + + A tuple (f_x, g_n) is being returned where f_x is modular independent function + of symbol and g_n being set of values f_x can have. + + Examples + ======== + + >>> from sympy import symbols, exp, Mod, Dummy, S + >>> from sympy.solvers.solveset import _invert_modular as invert_modular + >>> x, y = symbols('x y') + >>> n = Dummy('n') + >>> invert_modular(Mod(exp(x), 7), S(5), n, x) + (Mod(exp(x), 7), 5) + >>> invert_modular(Mod(x, 7), S(5), n, x) + (x, ImageSet(Lambda(_n, 7*_n + 5), Integers)) + >>> invert_modular(Mod(3*x + 8, 7), S(5), n, x) + (x, ImageSet(Lambda(_n, 7*_n + 6), Integers)) + >>> invert_modular(Mod(x**4, 7), S(5), n, x) + (x, EmptySet) + >>> invert_modular(Mod(2**(x**2 + x + 1), 7), S(2), n, x) + (x**2 + x + 1, ImageSet(Lambda(_n, 3*_n + 1), Naturals0)) + + """ + a, m = modterm.args + + if rhs.is_integer is False: + return symbol, S.EmptySet + + if rhs.is_real is False or any(term.is_real is False + for term in list(_term_factors(a))): + # Check for complex arguments + return modterm, rhs + + if abs(rhs) >= abs(m): + # if rhs has value greater than value of m. + return symbol, S.EmptySet + + if a == symbol: + return symbol, ImageSet(Lambda(n, m*n + rhs), S.Integers) + + if a.is_Add: + # g + h = a + g, h = a.as_independent(symbol) + if g is not S.Zero: + x_indep_term = rhs - Mod(g, m) + return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol) + + if a.is_Mul: + # g*h = a + g, h = a.as_independent(symbol) + if g is not S.One: + x_indep_term = rhs*invert(g, m) + return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol) + + if a.is_Pow: + # base**expo = a + base, expo = a.args + if expo.has(symbol) and not base.has(symbol): + # remainder -> solution independent of n of equation. + # m, rhs are made coprime by dividing number_gcd(m, rhs) + if not m.is_Integer and rhs.is_Integer and a.base.is_Integer: + return modterm, rhs + + mdiv = m.p // number_gcd(m.p, rhs.p) + try: + remainder = discrete_log(mdiv, rhs.p, a.base.p) + except ValueError: # log does not exist + return modterm, rhs + # period -> coefficient of n in the solution and also referred as + # the least period of expo in which it is repeats itself. + # (a**(totient(m)) - 1) divides m. Here is link of theorem: + # (https://en.wikipedia.org/wiki/Euler's_theorem) + period = totient(m) + for p in divisors(period): + # there might a lesser period exist than totient(m). + if pow(a.base, p, m / number_gcd(m.p, a.base.p)) == 1: + period = p + break + # recursion is not applied here since _invert_modular is currently + # not smart enough to handle infinite rhs as here expo has infinite + # rhs = ImageSet(Lambda(n, period*n + remainder), S.Naturals0). + return expo, ImageSet(Lambda(n, period*n + remainder), S.Naturals0) + elif base.has(symbol) and not expo.has(symbol): + try: + remainder_list = nthroot_mod(rhs, expo, m, all_roots=True) + if remainder_list == []: + return symbol, S.EmptySet + except (ValueError, NotImplementedError): + return modterm, rhs + g_n = S.EmptySet + for rem in remainder_list: + g_n += ImageSet(Lambda(n, m*n + rem), S.Integers) + return base, g_n + + return modterm, rhs + + +def _solve_modular(f, symbol, domain): + r""" + Helper function for solving modular equations of type ``A - Mod(B, C) = 0``, + where A can or cannot be a function of symbol, B is surely a function of + symbol and C is an integer. + + Currently ``_solve_modular`` is only able to solve cases + where A is not a function of symbol. + + Parameters + ========== + + f : Expr + The modular equation to be solved, ``f = 0`` + + symbol : Symbol + The variable in the equation to be solved. + + domain : Set + A set over which the equation is solved. It has to be a subset of + Integers. + + Returns + ======= + + A set of integer solutions satisfying the given modular equation. + A ``ConditionSet`` if the equation is unsolvable. + + Examples + ======== + + >>> from sympy.solvers.solveset import _solve_modular as solve_modulo + >>> from sympy import S, Symbol, sin, Intersection, Interval, Mod + >>> x = Symbol('x') + >>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Integers) + ImageSet(Lambda(_n, 7*_n + 5), Integers) + >>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Reals) # domain should be subset of integers. + ConditionSet(x, Eq(Mod(5*x + 6, 7) - 3, 0), Reals) + >>> solve_modulo(-7 + Mod(x, 5), x, S.Integers) + EmptySet + >>> solve_modulo(Mod(12**x, 21) - 18, x, S.Integers) + ImageSet(Lambda(_n, 6*_n + 2), Naturals0) + >>> solve_modulo(Mod(sin(x), 7) - 3, x, S.Integers) # not solvable + ConditionSet(x, Eq(Mod(sin(x), 7) - 3, 0), Integers) + >>> solve_modulo(3 - Mod(x, 5), x, Intersection(S.Integers, Interval(0, 100))) + Intersection(ImageSet(Lambda(_n, 5*_n + 3), Integers), Range(0, 101, 1)) + """ + # extract modterm and g_y from f + unsolved_result = ConditionSet(symbol, Eq(f, 0), domain) + modterm = list(f.atoms(Mod))[0] + rhs = -S.One*(f.subs(modterm, S.Zero)) + if f.as_coefficients_dict()[modterm].is_negative: + # checks if coefficient of modterm is negative in main equation. + rhs *= -S.One + + if not domain.is_subset(S.Integers): + return unsolved_result + + if rhs.has(symbol): + # TODO Case: A-> function of symbol, can be extended here + # in future. + return unsolved_result + + n = Dummy('n', integer=True) + f_x, g_n = _invert_modular(modterm, rhs, n, symbol) + + if f_x == modterm and g_n == rhs: + return unsolved_result + + if f_x == symbol: + if domain is not S.Integers: + return domain.intersect(g_n) + return g_n + + if isinstance(g_n, ImageSet): + lamda_expr = g_n.lamda.expr + lamda_vars = g_n.lamda.variables + base_sets = g_n.base_sets + sol_set = _solveset(f_x - lamda_expr, symbol, S.Integers) + if isinstance(sol_set, FiniteSet): + tmp_sol = S.EmptySet + for sol in sol_set: + tmp_sol += ImageSet(Lambda(lamda_vars, sol), *base_sets) + sol_set = tmp_sol + else: + sol_set = ImageSet(Lambda(lamda_vars, sol_set), *base_sets) + return domain.intersect(sol_set) + + return unsolved_result + + +def _term_factors(f): + """ + Iterator to get the factors of all terms present + in the given equation. + + Parameters + ========== + f : Expr + Equation that needs to be addressed + + Returns + ======= + Factors of all terms present in the equation. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.solvers.solveset import _term_factors + >>> x = symbols('x') + >>> list(_term_factors(-2 - x**2 + x*(x + 1))) + [-2, -1, x**2, x, x + 1] + """ + for add_arg in Add.make_args(f): + yield from Mul.make_args(add_arg) + + +def _solve_exponential(lhs, rhs, symbol, domain): + r""" + Helper function for solving (supported) exponential equations. + + Exponential equations are the sum of (currently) at most + two terms with one or both of them having a power with a + symbol-dependent exponent. + + For example + + .. math:: 5^{2x + 3} - 5^{3x - 1} + + .. math:: 4^{5 - 9x} - e^{2 - x} + + Parameters + ========== + + lhs, rhs : Expr + The exponential equation to be solved, `lhs = rhs` + + symbol : Symbol + The variable in which the equation is solved + + domain : Set + A set over which the equation is solved. + + Returns + ======= + + A set of solutions satisfying the given equation. + A ``ConditionSet`` if the equation is unsolvable or + if the assumptions are not properly defined, in that case + a different style of ``ConditionSet`` is returned having the + solution(s) of the equation with the desired assumptions. + + Examples + ======== + + >>> from sympy.solvers.solveset import _solve_exponential as solve_expo + >>> from sympy import symbols, S + >>> x = symbols('x', real=True) + >>> a, b = symbols('a b') + >>> solve_expo(2**x + 3**x - 5**x, 0, x, S.Reals) # not solvable + ConditionSet(x, Eq(2**x + 3**x - 5**x, 0), Reals) + >>> solve_expo(a**x - b**x, 0, x, S.Reals) # solvable but incorrect assumptions + ConditionSet(x, (a > 0) & (b > 0), {0}) + >>> solve_expo(3**(2*x) - 2**(x + 3), 0, x, S.Reals) + {-3*log(2)/(-2*log(3) + log(2))} + >>> solve_expo(2**x - 4**x, 0, x, S.Reals) + {0} + + * Proof of correctness of the method + + The logarithm function is the inverse of the exponential function. + The defining relation between exponentiation and logarithm is: + + .. math:: {\log_b x} = y \enspace if \enspace b^y = x + + Therefore if we are given an equation with exponent terms, we can + convert every term to its corresponding logarithmic form. This is + achieved by taking logarithms and expanding the equation using + logarithmic identities so that it can easily be handled by ``solveset``. + + For example: + + .. math:: 3^{2x} = 2^{x + 3} + + Taking log both sides will reduce the equation to + + .. math:: (2x)\log(3) = (x + 3)\log(2) + + This form can be easily handed by ``solveset``. + """ + unsolved_result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain) + newlhs = powdenest(lhs) + if lhs != newlhs: + # it may also be advantageous to factor the new expr + neweq = factor(newlhs - rhs) + if neweq != (lhs - rhs): + return _solveset(neweq, symbol, domain) # try again with _solveset + + if not (isinstance(lhs, Add) and len(lhs.args) == 2): + # solving for the sum of more than two powers is possible + # but not yet implemented + return unsolved_result + + if rhs != 0: + return unsolved_result + + a, b = list(ordered(lhs.args)) + a_term = a.as_independent(symbol)[1] + b_term = b.as_independent(symbol)[1] + + a_base, a_exp = a_term.as_base_exp() + b_base, b_exp = b_term.as_base_exp() + + if domain.is_subset(S.Reals): + conditions = And( + a_base > 0, + b_base > 0, + Eq(im(a_exp), 0), + Eq(im(b_exp), 0)) + else: + conditions = And( + Ne(a_base, 0), + Ne(b_base, 0)) + + L, R = (expand_log(log(i), force=True) for i in (a, -b)) + solutions = _solveset(L - R, symbol, domain) + + return ConditionSet(symbol, conditions, solutions) + + +def _is_exponential(f, symbol): + r""" + Return ``True`` if one or more terms contain ``symbol`` only in + exponents, else ``False``. + + Parameters + ========== + + f : Expr + The equation to be checked + + symbol : Symbol + The variable in which the equation is checked + + Examples + ======== + + >>> from sympy import symbols, cos, exp + >>> from sympy.solvers.solveset import _is_exponential as check + >>> x, y = symbols('x y') + >>> check(y, y) + False + >>> check(x**y - 1, y) + True + >>> check(x**y*2**y - 1, y) + True + >>> check(exp(x + 3) + 3**x, x) + True + >>> check(cos(2**x), x) + False + + * Philosophy behind the helper + + The function extracts each term of the equation and checks if it is + of exponential form w.r.t ``symbol``. + """ + rv = False + for expr_arg in _term_factors(f): + if symbol not in expr_arg.free_symbols: + continue + if (isinstance(expr_arg, Pow) and + symbol not in expr_arg.base.free_symbols or + isinstance(expr_arg, exp)): + rv = True # symbol in exponent + else: + return False # dependent on symbol in non-exponential way + return rv + + +def _solve_logarithm(lhs, rhs, symbol, domain): + r""" + Helper to solve logarithmic equations which are reducible + to a single instance of `\log`. + + Logarithmic equations are (currently) the equations that contains + `\log` terms which can be reduced to a single `\log` term or + a constant using various logarithmic identities. + + For example: + + .. math:: \log(x) + \log(x - 4) + + can be reduced to: + + .. math:: \log(x(x - 4)) + + Parameters + ========== + + lhs, rhs : Expr + The logarithmic equation to be solved, `lhs = rhs` + + symbol : Symbol + The variable in which the equation is solved + + domain : Set + A set over which the equation is solved. + + Returns + ======= + + A set of solutions satisfying the given equation. + A ``ConditionSet`` if the equation is unsolvable. + + Examples + ======== + + >>> from sympy import symbols, log, S + >>> from sympy.solvers.solveset import _solve_logarithm as solve_log + >>> x = symbols('x') + >>> f = log(x - 3) + log(x + 3) + >>> solve_log(f, 0, x, S.Reals) + {-sqrt(10), sqrt(10)} + + * Proof of correctness + + A logarithm is another way to write exponent and is defined by + + .. math:: {\log_b x} = y \enspace if \enspace b^y = x + + When one side of the equation contains a single logarithm, the + equation can be solved by rewriting the equation as an equivalent + exponential equation as defined above. But if one side contains + more than one logarithm, we need to use the properties of logarithm + to condense it into a single logarithm. + + Take for example + + .. math:: \log(2x) - 15 = 0 + + contains single logarithm, therefore we can directly rewrite it to + exponential form as + + .. math:: x = \frac{e^{15}}{2} + + But if the equation has more than one logarithm as + + .. math:: \log(x - 3) + \log(x + 3) = 0 + + we use logarithmic identities to convert it into a reduced form + + Using, + + .. math:: \log(a) + \log(b) = \log(ab) + + the equation becomes, + + .. math:: \log((x - 3)(x + 3)) + + This equation contains one logarithm and can be solved by rewriting + to exponents. + """ + new_lhs = logcombine(lhs, force=True) + new_f = new_lhs - rhs + + return _solveset(new_f, symbol, domain) + + +def _is_logarithmic(f, symbol): + r""" + Return ``True`` if the equation is in the form + `a\log(f(x)) + b\log(g(x)) + ... + c` else ``False``. + + Parameters + ========== + + f : Expr + The equation to be checked + + symbol : Symbol + The variable in which the equation is checked + + Returns + ======= + + ``True`` if the equation is logarithmic otherwise ``False``. + + Examples + ======== + + >>> from sympy import symbols, tan, log + >>> from sympy.solvers.solveset import _is_logarithmic as check + >>> x, y = symbols('x y') + >>> check(log(x + 2) - log(x + 3), x) + True + >>> check(tan(log(2*x)), x) + False + >>> check(x*log(x), x) + False + >>> check(x + log(x), x) + False + >>> check(y + log(x), x) + True + + * Philosophy behind the helper + + The function extracts each term and checks whether it is + logarithmic w.r.t ``symbol``. + """ + rv = False + for term in Add.make_args(f): + saw_log = False + for term_arg in Mul.make_args(term): + if symbol not in term_arg.free_symbols: + continue + if isinstance(term_arg, log): + if saw_log: + return False # more than one log in term + saw_log = True + else: + return False # dependent on symbol in non-log way + if saw_log: + rv = True + return rv + + +def _is_lambert(f, symbol): + r""" + If this returns ``False`` then the Lambert solver (``_solve_lambert``) will not be called. + + Explanation + =========== + + Quick check for cases that the Lambert solver might be able to handle. + + 1. Equations containing more than two operands and `symbol`s involving any of + `Pow`, `exp`, `HyperbolicFunction`,`TrigonometricFunction`, `log` terms. + + 2. In `Pow`, `exp` the exponent should have `symbol` whereas for + `HyperbolicFunction`,`TrigonometricFunction`, `log` should contain `symbol`. + + 3. For `HyperbolicFunction`,`TrigonometricFunction` the number of trigonometric functions in + equation should be less than number of symbols. (since `A*cos(x) + B*sin(x) - c` + is not the Lambert type). + + Some forms of lambert equations are: + 1. X**X = C + 2. X*(B*log(X) + D)**A = C + 3. A*log(B*X + A) + d*X = C + 4. (B*X + A)*exp(d*X + g) = C + 5. g*exp(B*X + h) - B*X = C + 6. A*D**(E*X + g) - B*X = C + 7. A*cos(X) + B*sin(X) - D*X = C + 8. A*cosh(X) + B*sinh(X) - D*X = C + + Where X is any variable, + A, B, C, D, E are any constants, + g, h are linear functions or log terms. + + Parameters + ========== + + f : Expr + The equation to be checked + + symbol : Symbol + The variable in which the equation is checked + + Returns + ======= + + If this returns ``False`` then the Lambert solver (``_solve_lambert``) will not be called. + + Examples + ======== + + >>> from sympy.solvers.solveset import _is_lambert + >>> from sympy import symbols, cosh, sinh, log + >>> x = symbols('x') + + >>> _is_lambert(3*log(x) - x*log(3), x) + True + >>> _is_lambert(log(log(x - 3)) + log(x-3), x) + True + >>> _is_lambert(cosh(x) - sinh(x), x) + False + >>> _is_lambert((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1), x) + True + + See Also + ======== + + _solve_lambert + + """ + term_factors = list(_term_factors(f.expand())) + + # total number of symbols in equation + no_of_symbols = len([arg for arg in term_factors if arg.has(symbol)]) + # total number of trigonometric terms in equation + no_of_trig = len([arg for arg in term_factors \ + if arg.has(HyperbolicFunction, TrigonometricFunction)]) + + if f.is_Add and no_of_symbols >= 2: + # `log`, `HyperbolicFunction`, `TrigonometricFunction` should have symbols + # and no_of_trig < no_of_symbols + lambert_funcs = (log, HyperbolicFunction, TrigonometricFunction) + if any(isinstance(arg, lambert_funcs)\ + for arg in term_factors if arg.has(symbol)): + if no_of_trig < no_of_symbols: + return True + # here, `Pow`, `exp` exponent should have symbols + elif any(isinstance(arg, (Pow, exp)) \ + for arg in term_factors if (arg.as_base_exp()[1]).has(symbol)): + return True + return False + + +def _transolve(f, symbol, domain): + r""" + Function to solve transcendental equations. It is a helper to + ``solveset`` and should be used internally. ``_transolve`` + currently supports the following class of equations: + + - Exponential equations + - Logarithmic equations + + Parameters + ========== + + f : Any transcendental equation that needs to be solved. + This needs to be an expression, which is assumed + to be equal to ``0``. + + symbol : The variable for which the equation is solved. + This needs to be of class ``Symbol``. + + domain : A set over which the equation is solved. + This needs to be of class ``Set``. + + Returns + ======= + + Set + A set of values for ``symbol`` for which ``f`` is equal to + zero. An ``EmptySet`` is returned if ``f`` does not have solutions + in respective domain. A ``ConditionSet`` is returned as unsolved + object if algorithms to evaluate complete solution are not + yet implemented. + + How to use ``_transolve`` + ========================= + + ``_transolve`` should not be used as an independent function, because + it assumes that the equation (``f``) and the ``symbol`` comes from + ``solveset`` and might have undergone a few modification(s). + To use ``_transolve`` as an independent function the equation (``f``) + and the ``symbol`` should be passed as they would have been by + ``solveset``. + + Examples + ======== + + >>> from sympy.solvers.solveset import _transolve as transolve + >>> from sympy.solvers.solvers import _tsolve as tsolve + >>> from sympy import symbols, S, pprint + >>> x = symbols('x', real=True) # assumption added + >>> transolve(5**(x - 3) - 3**(2*x + 1), x, S.Reals) + {-(log(3) + 3*log(5))/(-log(5) + 2*log(3))} + + How ``_transolve`` works + ======================== + + ``_transolve`` uses two types of helper functions to solve equations + of a particular class: + + Identifying helpers: To determine whether a given equation + belongs to a certain class of equation or not. Returns either + ``True`` or ``False``. + + Solving helpers: Once an equation is identified, a corresponding + helper either solves the equation or returns a form of the equation + that ``solveset`` might better be able to handle. + + * Philosophy behind the module + + The purpose of ``_transolve`` is to take equations which are not + already polynomial in their generator(s) and to either recast them + as such through a valid transformation or to solve them outright. + A pair of helper functions for each class of supported + transcendental functions are employed for this purpose. One + identifies the transcendental form of an equation and the other + either solves it or recasts it into a tractable form that can be + solved by ``solveset``. + For example, an equation in the form `ab^{f(x)} - cd^{g(x)} = 0` + can be transformed to + `\log(a) + f(x)\log(b) - \log(c) - g(x)\log(d) = 0` + (under certain assumptions) and this can be solved with ``solveset`` + if `f(x)` and `g(x)` are in polynomial form. + + How ``_transolve`` is better than ``_tsolve`` + ============================================= + + 1) Better output + + ``_transolve`` provides expressions in a more simplified form. + + Consider a simple exponential equation + + >>> f = 3**(2*x) - 2**(x + 3) + >>> pprint(transolve(f, x, S.Reals), use_unicode=False) + -3*log(2) + {------------------} + -2*log(3) + log(2) + >>> pprint(tsolve(f, x), use_unicode=False) + / 3 \ + | --------| + | log(2/9)| + [-log\2 /] + + 2) Extensible + + The API of ``_transolve`` is designed such that it is easily + extensible, i.e. the code that solves a given class of + equations is encapsulated in a helper and not mixed in with + the code of ``_transolve`` itself. + + 3) Modular + + ``_transolve`` is designed to be modular i.e, for every class of + equation a separate helper for identification and solving is + implemented. This makes it easy to change or modify any of the + method implemented directly in the helpers without interfering + with the actual structure of the API. + + 4) Faster Computation + + Solving equation via ``_transolve`` is much faster as compared to + ``_tsolve``. In ``solve``, attempts are made computing every possibility + to get the solutions. This series of attempts makes solving a bit + slow. In ``_transolve``, computation begins only after a particular + type of equation is identified. + + How to add new class of equations + ================================= + + Adding a new class of equation solver is a three-step procedure: + + - Identify the type of the equations + + Determine the type of the class of equations to which they belong: + it could be of ``Add``, ``Pow``, etc. types. Separate internal functions + are used for each type. Write identification and solving helpers + and use them from within the routine for the given type of equation + (after adding it, if necessary). Something like: + + .. code-block:: python + + def add_type(lhs, rhs, x): + .... + if _is_exponential(lhs, x): + new_eq = _solve_exponential(lhs, rhs, x) + .... + rhs, lhs = eq.as_independent(x) + if lhs.is_Add: + result = add_type(lhs, rhs, x) + + - Define the identification helper. + + - Define the solving helper. + + Apart from this, a few other things needs to be taken care while + adding an equation solver: + + - Naming conventions: + Name of the identification helper should be as + ``_is_class`` where class will be the name or abbreviation + of the class of equation. The solving helper will be named as + ``_solve_class``. + For example: for exponential equations it becomes + ``_is_exponential`` and ``_solve_expo``. + - The identifying helpers should take two input parameters, + the equation to be checked and the variable for which a solution + is being sought, while solving helpers would require an additional + domain parameter. + - Be sure to consider corner cases. + - Add tests for each helper. + - Add a docstring to your helper that describes the method + implemented. + The documentation of the helpers should identify: + + - the purpose of the helper, + - the method used to identify and solve the equation, + - a proof of correctness + - the return values of the helpers + """ + + def add_type(lhs, rhs, symbol, domain): + """ + Helper for ``_transolve`` to handle equations of + ``Add`` type, i.e. equations taking the form as + ``a*f(x) + b*g(x) + .... = c``. + For example: 4**x + 8**x = 0 + """ + result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain) + + # check if it is exponential type equation + if _is_exponential(lhs, symbol): + result = _solve_exponential(lhs, rhs, symbol, domain) + # check if it is logarithmic type equation + elif _is_logarithmic(lhs, symbol): + result = _solve_logarithm(lhs, rhs, symbol, domain) + + return result + + result = ConditionSet(symbol, Eq(f, 0), domain) + + # invert_complex handles the call to the desired inverter based + # on the domain specified. + lhs, rhs_s = invert_complex(f, 0, symbol, domain) + + if isinstance(rhs_s, FiniteSet): + assert (len(rhs_s.args)) == 1 + rhs = rhs_s.args[0] + + if lhs.is_Add: + result = add_type(lhs, rhs, symbol, domain) + else: + result = rhs_s + + return result + + +def solveset(f, symbol=None, domain=S.Complexes): + r"""Solves a given inequality or equation with set as output + + Parameters + ========== + + f : Expr or a relational. + The target equation or inequality + symbol : Symbol + The variable for which the equation is solved + domain : Set + The domain over which the equation is solved + + Returns + ======= + + Set + A set of values for `symbol` for which `f` is True or is equal to + zero. An :class:`~.EmptySet` is returned if `f` is False or nonzero. + A :class:`~.ConditionSet` is returned as unsolved object if algorithms + to evaluate complete solution are not yet implemented. + + ``solveset`` claims to be complete in the solution set that it returns. + + Raises + ====== + + NotImplementedError + The algorithms to solve inequalities in complex domain are + not yet implemented. + ValueError + The input is not valid. + RuntimeError + It is a bug, please report to the github issue tracker. + + + Notes + ===== + + Python interprets 0 and 1 as False and True, respectively, but + in this function they refer to solutions of an expression. So 0 and 1 + return the domain and EmptySet, respectively, while True and False + return the opposite (as they are assumed to be solutions of relational + expressions). + + + See Also + ======== + + solveset_real: solver for real domain + solveset_complex: solver for complex domain + + Examples + ======== + + >>> from sympy import exp, sin, Symbol, pprint, S, Eq + >>> from sympy.solvers.solveset import solveset, solveset_real + + * The default domain is complex. Not specifying a domain will lead + to the solving of the equation in the complex domain (and this + is not affected by the assumptions on the symbol): + + >>> x = Symbol('x') + >>> pprint(solveset(exp(x) - 1, x), use_unicode=False) + {2*n*I*pi | n in Integers} + + >>> x = Symbol('x', real=True) + >>> pprint(solveset(exp(x) - 1, x), use_unicode=False) + {2*n*I*pi | n in Integers} + + * If you want to use ``solveset`` to solve the equation in the + real domain, provide a real domain. (Using ``solveset_real`` + does this automatically.) + + >>> R = S.Reals + >>> x = Symbol('x') + >>> solveset(exp(x) - 1, x, R) + {0} + >>> solveset_real(exp(x) - 1, x) + {0} + + The solution is unaffected by assumptions on the symbol: + + >>> p = Symbol('p', positive=True) + >>> pprint(solveset(p**2 - 4)) + {-2, 2} + + When a :class:`~.ConditionSet` is returned, symbols with assumptions that + would alter the set are replaced with more generic symbols: + + >>> i = Symbol('i', imaginary=True) + >>> solveset(Eq(i**2 + i*sin(i), 1), i, domain=S.Reals) + ConditionSet(_R, Eq(_R**2 + _R*sin(_R) - 1, 0), Reals) + + * Inequalities can be solved over the real domain only. Use of a complex + domain leads to a NotImplementedError. + + >>> solveset(exp(x) > 1, x, R) + Interval.open(0, oo) + + """ + f = sympify(f) + symbol = sympify(symbol) + + if f is S.true: + return domain + + if f is S.false: + return S.EmptySet + + if not isinstance(f, (Expr, Relational, Number)): + raise ValueError("%s is not a valid SymPy expression" % f) + + if not isinstance(symbol, (Expr, Relational)) and symbol is not None: + raise ValueError("%s is not a valid SymPy symbol" % (symbol,)) + + if not isinstance(domain, Set): + raise ValueError("%s is not a valid domain" %(domain)) + + free_symbols = f.free_symbols + + if f.has(Piecewise): + f = piecewise_fold(f) + + if symbol is None and not free_symbols: + b = Eq(f, 0) + if b is S.true: + return domain + elif b is S.false: + return S.EmptySet + else: + raise NotImplementedError(filldedent(''' + relationship between value and 0 is unknown: %s''' % b)) + + if symbol is None: + if len(free_symbols) == 1: + symbol = free_symbols.pop() + elif free_symbols: + raise ValueError(filldedent(''' + The independent variable must be specified for a + multivariate equation.''')) + elif not isinstance(symbol, Symbol): + f, s, swap = recast_to_symbols([f], [symbol]) + # the xreplace will be needed if a ConditionSet is returned + return solveset(f[0], s[0], domain).xreplace(swap) + + # solveset should ignore assumptions on symbols + newsym = None + if domain.is_subset(S.Reals): + if symbol._assumptions_orig != {'real': True}: + newsym = Dummy('R', real=True) + elif domain.is_subset(S.Complexes): + if symbol._assumptions_orig != {'complex': True}: + newsym = Dummy('C', complex=True) + + if newsym is not None: + rv = solveset(f.xreplace({symbol: newsym}), newsym, domain) + # try to use the original symbol if possible + try: + _rv = rv.xreplace({newsym: symbol}) + except TypeError: + _rv = rv + if rv.dummy_eq(_rv): + rv = _rv + return rv + + # Abs has its own handling method which avoids the + # rewriting property that the first piece of abs(x) + # is for x >= 0 and the 2nd piece for x < 0 -- solutions + # can look better if the 2nd condition is x <= 0. Since + # the solution is a set, duplication of results is not + # an issue, e.g. {y, -y} when y is 0 will be {0} + f, mask = _masked(f, Abs) + f = f.rewrite(Piecewise) # everything that's not an Abs + for d, e in mask: + # everything *in* an Abs + e = e.func(e.args[0].rewrite(Piecewise)) + f = f.xreplace({d: e}) + f = piecewise_fold(f) + + return _solveset(f, symbol, domain, _check=True) + + +def solveset_real(f, symbol): + return solveset(f, symbol, S.Reals) + + +def solveset_complex(f, symbol): + return solveset(f, symbol, S.Complexes) + + +def _solveset_multi(eqs, syms, domains): + '''Basic implementation of a multivariate solveset. + + For internal use (not ready for public consumption)''' + + rep = {} + for sym, dom in zip(syms, domains): + if dom is S.Reals: + rep[sym] = Symbol(sym.name, real=True) + eqs = [eq.subs(rep) for eq in eqs] + syms = [sym.subs(rep) for sym in syms] + + syms = tuple(syms) + + if len(eqs) == 0: + return ProductSet(*domains) + + if len(syms) == 1: + sym = syms[0] + domain = domains[0] + solsets = [solveset(eq, sym, domain) for eq in eqs] + solset = Intersection(*solsets) + return ImageSet(Lambda((sym,), (sym,)), solset).doit() + + eqs = sorted(eqs, key=lambda eq: len(eq.free_symbols & set(syms))) + + for n, eq in enumerate(eqs): + sols = [] + all_handled = True + for sym in syms: + if sym not in eq.free_symbols: + continue + sol = solveset(eq, sym, domains[syms.index(sym)]) + + if isinstance(sol, FiniteSet): + i = syms.index(sym) + symsp = syms[:i] + syms[i+1:] + domainsp = domains[:i] + domains[i+1:] + eqsp = eqs[:n] + eqs[n+1:] + for s in sol: + eqsp_sub = [eq.subs(sym, s) for eq in eqsp] + sol_others = _solveset_multi(eqsp_sub, symsp, domainsp) + fun = Lambda((symsp,), symsp[:i] + (s,) + symsp[i:]) + sols.append(ImageSet(fun, sol_others).doit()) + else: + all_handled = False + if all_handled: + return Union(*sols) + + +def solvify(f, symbol, domain): + """Solves an equation using solveset and returns the solution in accordance + with the `solve` output API. + + Returns + ======= + + We classify the output based on the type of solution returned by `solveset`. + + Solution | Output + ---------------------------------------- + FiniteSet | list + + ImageSet, | list (if `f` is periodic) + Union | + + Union | list (with FiniteSet) + + EmptySet | empty list + + Others | None + + + Raises + ====== + + NotImplementedError + A ConditionSet is the input. + + Examples + ======== + + >>> from sympy.solvers.solveset import solvify + >>> from sympy.abc import x + >>> from sympy import S, tan, sin, exp + >>> solvify(x**2 - 9, x, S.Reals) + [-3, 3] + >>> solvify(sin(x) - 1, x, S.Reals) + [pi/2] + >>> solvify(tan(x), x, S.Reals) + [0] + >>> solvify(exp(x) - 1, x, S.Complexes) + + >>> solvify(exp(x) - 1, x, S.Reals) + [0] + + """ + solution_set = solveset(f, symbol, domain) + result = None + if solution_set is S.EmptySet: + result = [] + + elif isinstance(solution_set, ConditionSet): + raise NotImplementedError('solveset is unable to solve this equation.') + + elif isinstance(solution_set, FiniteSet): + result = list(solution_set) + + else: + period = periodicity(f, symbol) + if period is not None: + solutions = S.EmptySet + iter_solutions = () + if isinstance(solution_set, ImageSet): + iter_solutions = (solution_set,) + elif isinstance(solution_set, Union): + if all(isinstance(i, ImageSet) for i in solution_set.args): + iter_solutions = solution_set.args + + for solution in iter_solutions: + solutions += solution.intersect(Interval(0, period, False, True)) + + if isinstance(solutions, FiniteSet): + result = list(solutions) + + else: + solution = solution_set.intersect(domain) + if isinstance(solution, Union): + # concerned about only FiniteSet with Union but not about ImageSet + # if required could be extend + if any(isinstance(i, FiniteSet) for i in solution.args): + result = [sol for soln in solution.args \ + for sol in soln.args if isinstance(soln,FiniteSet)] + else: + return None + + elif isinstance(solution, FiniteSet): + result += solution + + return result + + +############################################################################### +################################ LINSOLVE ##################################### +############################################################################### + + +def linear_coeffs(eq, *syms, dict=False): + """Return a list whose elements are the coefficients of the + corresponding symbols in the sum of terms in ``eq``. + The additive constant is returned as the last element of the + list. + + Raises + ====== + + NonlinearError + The equation contains a nonlinear term + ValueError + duplicate or unordered symbols are passed + + Parameters + ========== + + dict - (default False) when True, return coefficients as a + dictionary with coefficients keyed to syms that were present; + key 1 gives the constant term + + Examples + ======== + + >>> from sympy.solvers.solveset import linear_coeffs + >>> from sympy.abc import x, y, z + >>> linear_coeffs(3*x + 2*y - 1, x, y) + [3, 2, -1] + + It is not necessary to expand the expression: + + >>> linear_coeffs(x + y*(z*(x*3 + 2) + 3), x) + [3*y*z + 1, y*(2*z + 3)] + + When nonlinear is detected, an error will be raised: + + * even if they would cancel after expansion (so the + situation does not pass silently past the caller's + attention) + + >>> eq = 1/x*(x - 1) + 1/x + >>> linear_coeffs(eq.expand(), x) + [0, 1] + >>> linear_coeffs(eq, x) + Traceback (most recent call last): + ... + NonlinearError: + nonlinear in given generators + + * when there are cross terms + + >>> linear_coeffs(x*(y + 1), x, y) + Traceback (most recent call last): + ... + NonlinearError: + symbol-dependent cross-terms encountered + + * when there are terms that contain an expression + dependent on the symbols that is not linear + + >>> linear_coeffs(x**2, x) + Traceback (most recent call last): + ... + NonlinearError: + nonlinear in given generators + """ + eq = _sympify(eq) + if len(syms) == 1 and iterable(syms[0]) and not isinstance(syms[0], Basic): + raise ValueError('expecting unpacked symbols, *syms') + symset = set(syms) + if len(symset) != len(syms): + raise ValueError('duplicate symbols given') + try: + d, c = _linear_eq_to_dict([eq], symset) + d = d[0] + c = c[0] + except PolyNonlinearError as err: + raise NonlinearError(str(err)) + if dict: + if c: + d[S.One] = c + return d + rv = [S.Zero]*(len(syms) + 1) + rv[-1] = c + for i, k in enumerate(syms): + if k not in d: + continue + rv[i] = d[k] + return rv + + +def linear_eq_to_matrix(equations, *symbols): + r""" + Converts a given System of Equations into Matrix form. Here ``equations`` + must be a linear system of equations in ``symbols``. Element ``M[i, j]`` + corresponds to the coefficient of the jth symbol in the ith equation. + + The Matrix form corresponds to the augmented matrix form. For example: + + .. math:: + + 4x + 2y + 3z & = 1 \\ + 3x + y + z & = -6 \\ + 2x + 4y + 9z & = 2 + + This system will return :math:`A` and :math:`b` as: + + .. math:: + + A = \left[\begin{array}{ccc} + 4 & 2 & 3 \\ + 3 & 1 & 1 \\ + 2 & 4 & 9 + \end{array}\right] \\ + + .. math:: + + b = \left[\begin{array}{c} + 1 \\ -6 \\ 2 + \end{array}\right] + + The only simplification performed is to convert + ``Eq(a, b)`` :math:`\Rightarrow a - b`. + + Raises + ====== + + NonlinearError + The equations contain a nonlinear term. + ValueError + The symbols are not given or are not unique. + + Examples + ======== + + >>> from sympy import linear_eq_to_matrix, symbols + >>> c, x, y, z = symbols('c, x, y, z') + + The coefficients (numerical or symbolic) of the symbols will + be returned as matrices: + + >>> eqns = [c*x + z - 1 - c, y + z, x - y] + >>> A, b = linear_eq_to_matrix(eqns, [x, y, z]) + >>> A + Matrix([ + [c, 0, 1], + [0, 1, 1], + [1, -1, 0]]) + >>> b + Matrix([ + [c + 1], + [ 0], + [ 0]]) + + This routine does not simplify expressions and will raise an error + if nonlinearity is encountered: + + >>> eqns = [ + ... (x**2 - 3*x)/(x - 3) - 3, + ... y**2 - 3*y - y*(y - 4) + x - 4] + >>> linear_eq_to_matrix(eqns, [x, y]) + Traceback (most recent call last): + ... + NonlinearError: + symbol-dependent term can be ignored using `strict=False` + + Simplifying these equations will discard the removable singularity in the + first and reveal the linear structure of the second: + + >>> [e.simplify() for e in eqns] + [x - 3, x + y - 4] + + Any such simplification needed to eliminate nonlinear terms must be done + *before* calling this routine. + + """ + if not symbols: + raise ValueError(filldedent(''' + Symbols must be given, for which coefficients + are to be found. + ''')) + + # Check if 'symbols' is a set and raise an error if it is + if isinstance(symbols[0], set): + raise TypeError( + "Unordered 'set' type is not supported as input for symbols.") + + if hasattr(symbols[0], '__iter__'): + symbols = symbols[0] + + if has_dups(symbols): + raise ValueError('Symbols must be unique') + + equations = sympify(equations) + if isinstance(equations, MatrixBase): + equations = list(equations) + elif isinstance(equations, (Expr, Eq)): + equations = [equations] + elif not is_sequence(equations): + raise ValueError(filldedent(''' + Equation(s) must be given as a sequence, Expr, + Eq or Matrix. + ''')) + + # construct the dictionaries + try: + eq, c = _linear_eq_to_dict(equations, symbols) + except PolyNonlinearError as err: + raise NonlinearError(str(err)) + # prepare output matrices + n, m = shape = len(eq), len(symbols) + ix = dict(zip(symbols, range(m))) + A = zeros(*shape) + for row, d in enumerate(eq): + for k in d: + col = ix[k] + A[row, col] = d[k] + b = Matrix(n, 1, [-i for i in c]) + return A, b + + +def linsolve(system, *symbols): + r""" + Solve system of $N$ linear equations with $M$ variables; both + underdetermined and overdetermined systems are supported. + The possible number of solutions is zero, one or infinite. + Zero solutions throws a ValueError, whereas infinite + solutions are represented parametrically in terms of the given + symbols. For unique solution a :class:`~.FiniteSet` of ordered tuples + is returned. + + All standard input formats are supported: + For the given set of equations, the respective input types + are given below: + + .. math:: 3x + 2y - z = 1 + .. math:: 2x - 2y + 4z = -2 + .. math:: 2x - y + 2z = 0 + + * Augmented matrix form, ``system`` given below: + + $$ \text{system} = \left[{array}{cccc} + 3 & 2 & -1 & 1\\ + 2 & -2 & 4 & -2\\ + 2 & -1 & 2 & 0 + \end{array}\right] $$ + + :: + + system = Matrix([[3, 2, -1, 1], [2, -2, 4, -2], [2, -1, 2, 0]]) + + * List of equations form + + :: + + system = [3x + 2y - z - 1, 2x - 2y + 4z + 2, 2x - y + 2z] + + * Input $A$ and $b$ in matrix form (from $Ax = b$) are given as: + + $$ A = \left[\begin{array}{ccc} + 3 & 2 & -1 \\ + 2 & -2 & 4 \\ + 2 & -1 & 2 + \end{array}\right] \ \ b = \left[\begin{array}{c} + 1 \\ -2 \\ 0 + \end{array}\right] $$ + + :: + + A = Matrix([[3, 2, -1], [2, -2, 4], [2, -1, 2]]) + b = Matrix([[1], [-2], [0]]) + system = (A, b) + + Symbols can always be passed but are actually only needed + when 1) a system of equations is being passed and 2) the + system is passed as an underdetermined matrix and one wants + to control the name of the free variables in the result. + An error is raised if no symbols are used for case 1, but if + no symbols are provided for case 2, internally generated symbols + will be provided. When providing symbols for case 2, there should + be at least as many symbols are there are columns in matrix A. + + The algorithm used here is Gauss-Jordan elimination, which + results, after elimination, in a row echelon form matrix. + + Returns + ======= + + A FiniteSet containing an ordered tuple of values for the + unknowns for which the `system` has a solution. (Wrapping + the tuple in FiniteSet is used to maintain a consistent + output format throughout solveset.) + + Returns EmptySet, if the linear system is inconsistent. + + Raises + ====== + + ValueError + The input is not valid. + The symbols are not given. + + Examples + ======== + + >>> from sympy import Matrix, linsolve, symbols + >>> x, y, z = symbols("x, y, z") + >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + >>> b = Matrix([3, 6, 9]) + >>> A + Matrix([ + [1, 2, 3], + [4, 5, 6], + [7, 8, 10]]) + >>> b + Matrix([ + [3], + [6], + [9]]) + >>> linsolve((A, b), [x, y, z]) + {(-1, 2, 0)} + + * Parametric Solution: In case the system is underdetermined, the + function will return a parametric solution in terms of the given + symbols. Those that are free will be returned unchanged. e.g. in + the system below, `z` is returned as the solution for variable z; + it can take on any value. + + >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + >>> b = Matrix([3, 6, 9]) + >>> linsolve((A, b), x, y, z) + {(z - 1, 2 - 2*z, z)} + + If no symbols are given, internally generated symbols will be used. + The ``tau0`` in the third position indicates (as before) that the third + variable -- whatever it is named -- can take on any value: + + >>> linsolve((A, b)) + {(tau0 - 1, 2 - 2*tau0, tau0)} + + * List of equations as input + + >>> Eqns = [3*x + 2*y - z - 1, 2*x - 2*y + 4*z + 2, - x + y/2 - z] + >>> linsolve(Eqns, x, y, z) + {(1, -2, -2)} + + * Augmented matrix as input + + >>> aug = Matrix([[2, 1, 3, 1], [2, 6, 8, 3], [6, 8, 18, 5]]) + >>> aug + Matrix([ + [2, 1, 3, 1], + [2, 6, 8, 3], + [6, 8, 18, 5]]) + >>> linsolve(aug, x, y, z) + {(3/10, 2/5, 0)} + + * Solve for symbolic coefficients + + >>> a, b, c, d, e, f = symbols('a, b, c, d, e, f') + >>> eqns = [a*x + b*y - c, d*x + e*y - f] + >>> linsolve(eqns, x, y) + {((-b*f + c*e)/(a*e - b*d), (a*f - c*d)/(a*e - b*d))} + + * A degenerate system returns solution as set of given + symbols. + + >>> system = Matrix(([0, 0, 0], [0, 0, 0], [0, 0, 0])) + >>> linsolve(system, x, y) + {(x, y)} + + * For an empty system linsolve returns empty set + + >>> linsolve([], x) + EmptySet + + * An error is raised if any nonlinearity is detected, even + if it could be removed with expansion + + >>> linsolve([x*(1/x - 1)], x) + Traceback (most recent call last): + ... + NonlinearError: nonlinear term: 1/x + + >>> linsolve([x*(y + 1)], x, y) + Traceback (most recent call last): + ... + NonlinearError: nonlinear cross-term: x*(y + 1) + + >>> linsolve([x**2 - 1], x) + Traceback (most recent call last): + ... + NonlinearError: nonlinear term: x**2 + """ + if not system: + return S.EmptySet + + # If second argument is an iterable + if symbols and hasattr(symbols[0], '__iter__'): + symbols = symbols[0] + sym_gen = isinstance(symbols, GeneratorType) + dup_msg = 'duplicate symbols given' + + + b = None # if we don't get b the input was bad + # unpack system + + if hasattr(system, '__iter__'): + + # 1). (A, b) + if len(system) == 2 and isinstance(system[0], MatrixBase): + A, b = system + + # 2). (eq1, eq2, ...) + if not isinstance(system[0], MatrixBase): + if sym_gen or not symbols: + raise ValueError(filldedent(''' + When passing a system of equations, the explicit + symbols for which a solution is being sought must + be given as a sequence, too. + ''')) + if len(set(symbols)) != len(symbols): + raise ValueError(dup_msg) + + # + # Pass to the sparse solver implemented in polys. It is important + # that we do not attempt to convert the equations to a matrix + # because that would be very inefficient for large sparse systems + # of equations. + # + eqs = system + eqs = [sympify(eq) for eq in eqs] + try: + sol = _linsolve(eqs, symbols) + except PolyNonlinearError as exc: + # e.g. cos(x) contains an element of the set of generators + raise NonlinearError(str(exc)) + + if sol is None: + return S.EmptySet + + sol = FiniteSet(Tuple(*(sol.get(sym, sym) for sym in symbols))) + return sol + + elif isinstance(system, MatrixBase) and not ( + symbols and not isinstance(symbols, GeneratorType) and + isinstance(symbols[0], MatrixBase)): + # 3). A augmented with b + A, b = system[:, :-1], system[:, -1:] + + if b is None: + raise ValueError("Invalid arguments") + if sym_gen: + symbols = [next(symbols) for i in range(A.cols)] + symset = set(symbols) + if any(symset & (A.free_symbols | b.free_symbols)): + raise ValueError(filldedent(''' + At least one of the symbols provided + already appears in the system to be solved. + One way to avoid this is to use Dummy symbols in + the generator, e.g. numbered_symbols('%s', cls=Dummy) + ''' % symbols[0].name.rstrip('1234567890'))) + elif len(symset) != len(symbols): + raise ValueError(dup_msg) + + if not symbols: + symbols = [Dummy() for _ in range(A.cols)] + name = _uniquely_named_symbol('tau', (A, b), + compare=lambda i: str(i).rstrip('1234567890')).name + gen = numbered_symbols(name) + else: + gen = None + + # This is just a wrapper for solve_lin_sys + eqs = [] + rows = A.tolist() + for rowi, bi in zip(rows, b): + terms = [elem * sym for elem, sym in zip(rowi, symbols) if elem] + terms.append(-bi) + eqs.append(Add(*terms)) + + eqs, ring = sympy_eqs_to_ring(eqs, symbols) + sol = solve_lin_sys(eqs, ring, _raw=False) + if sol is None: + return S.EmptySet + #sol = {sym:val for sym, val in sol.items() if sym != val} + sol = FiniteSet(Tuple(*(sol.get(sym, sym) for sym in symbols))) + + if gen is not None: + solsym = sol.free_symbols + rep = {sym: next(gen) for sym in symbols if sym in solsym} + sol = sol.subs(rep) + + return sol + + +############################################################################## +# ------------------------------nonlinsolve ---------------------------------# +############################################################################## + + +def _return_conditionset(eqs, symbols): + # return conditionset + eqs = (Eq(lhs, 0) for lhs in eqs) + condition_set = ConditionSet( + Tuple(*symbols), And(*eqs), S.Complexes**len(symbols)) + return condition_set + + +def substitution(system, symbols, result=[{}], known_symbols=[], + exclude=[], all_symbols=None): + r""" + Solves the `system` using substitution method. It is used in + :func:`~.nonlinsolve`. This will be called from :func:`~.nonlinsolve` when any + equation(s) is non polynomial equation. + + Parameters + ========== + + system : list of equations + The target system of equations + symbols : list of symbols to be solved. + The variable(s) for which the system is solved + known_symbols : list of solved symbols + Values are known for these variable(s) + result : An empty list or list of dict + If No symbol values is known then empty list otherwise + symbol as keys and corresponding value in dict. + exclude : Set of expression. + Mostly denominator expression(s) of the equations of the system. + Final solution should not satisfy these expressions. + all_symbols : known_symbols + symbols(unsolved). + + Returns + ======= + + A FiniteSet of ordered tuple of values of `all_symbols` for which the + `system` has solution. Order of values in the tuple is same as symbols + present in the parameter `all_symbols`. If parameter `all_symbols` is None + then same as symbols present in the parameter `symbols`. + + Please note that general FiniteSet is unordered, the solution returned + here is not simply a FiniteSet of solutions, rather it is a FiniteSet of + ordered tuple, i.e. the first & only argument to FiniteSet is a tuple of + solutions, which is ordered, & hence the returned solution is ordered. + + Also note that solution could also have been returned as an ordered tuple, + FiniteSet is just a wrapper `{}` around the tuple. It has no other + significance except for the fact it is just used to maintain a consistent + output format throughout the solveset. + + Raises + ====== + + ValueError + The input is not valid. + The symbols are not given. + AttributeError + The input symbols are not :class:`~.Symbol` type. + + Examples + ======== + + >>> from sympy import symbols, substitution + >>> x, y = symbols('x, y', real=True) + >>> substitution([x + y], [x], [{y: 1}], [y], set([]), [x, y]) + {(-1, 1)} + + * When you want a soln not satisfying $x + 1 = 0$ + + >>> substitution([x + y], [x], [{y: 1}], [y], set([x + 1]), [y, x]) + EmptySet + >>> substitution([x + y], [x], [{y: 1}], [y], set([x - 1]), [y, x]) + {(1, -1)} + >>> substitution([x + y - 1, y - x**2 + 5], [x, y]) + {(-3, 4), (2, -1)} + + * Returns both real and complex solution + + >>> x, y, z = symbols('x, y, z') + >>> from sympy import exp, sin + >>> substitution([exp(x) - sin(y), y**2 - 4], [x, y]) + {(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2), + (ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2)} + + >>> eqs = [z**2 + exp(2*x) - sin(y), -3 + exp(-y)] + >>> substitution(eqs, [y, z]) + {(-log(3), -sqrt(-exp(2*x) - sin(log(3)))), + (-log(3), sqrt(-exp(2*x) - sin(log(3)))), + (ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers), + ImageSet(Lambda(_n, -sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers)), + (ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers), + ImageSet(Lambda(_n, sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers))} + + """ + + if not system: + return S.EmptySet + + for i, e in enumerate(system): + if isinstance(e, Eq): + system[i] = e.lhs - e.rhs + + if not symbols: + msg = ('Symbols must be given, for which solution of the ' + 'system is to be found.') + raise ValueError(filldedent(msg)) + + if not is_sequence(symbols): + msg = ('symbols should be given as a sequence, e.g. a list.' + 'Not type %s: %s') + raise TypeError(filldedent(msg % (type(symbols), symbols))) + + if not getattr(symbols[0], 'is_Symbol', False): + msg = ('Iterable of symbols must be given as ' + 'second argument, not type %s: %s') + raise ValueError(filldedent(msg % (type(symbols[0]), symbols[0]))) + + # By default `all_symbols` will be same as `symbols` + if all_symbols is None: + all_symbols = symbols + + old_result = result + # storing complements and intersection for particular symbol + complements = {} + intersections = {} + + # when total_solveset_call equals total_conditionset + # it means that solveset failed to solve all eqs. + total_conditionset = -1 + total_solveset_call = -1 + + def _unsolved_syms(eq, sort=False): + """Returns the unsolved symbol present + in the equation `eq`. + """ + free = eq.free_symbols + unsolved = (free - set(known_symbols)) & set(all_symbols) + if sort: + unsolved = list(unsolved) + unsolved.sort(key=default_sort_key) + return unsolved + + # sort such that equation with the fewest potential symbols is first. + # means eq with less number of variable first in the list. + eqs_in_better_order = list( + ordered(system, lambda _: len(_unsolved_syms(_)))) + + def add_intersection_complement(result, intersection_dict, complement_dict): + # If solveset has returned some intersection/complement + # for any symbol, it will be added in the final solution. + final_result = [] + for res in result: + res_copy = res + for key_res, value_res in res.items(): + intersect_set, complement_set = None, None + for key_sym, value_sym in intersection_dict.items(): + if key_sym == key_res: + intersect_set = value_sym + for key_sym, value_sym in complement_dict.items(): + if key_sym == key_res: + complement_set = value_sym + if intersect_set or complement_set: + new_value = FiniteSet(value_res) + if intersect_set and intersect_set != S.Complexes: + new_value = Intersection(new_value, intersect_set) + if complement_set: + new_value = Complement(new_value, complement_set) + if new_value is S.EmptySet: + res_copy = None + break + elif new_value.is_FiniteSet and len(new_value) == 1: + res_copy[key_res] = set(new_value).pop() + else: + res_copy[key_res] = new_value + + if res_copy is not None: + final_result.append(res_copy) + return final_result + + def _extract_main_soln(sym, sol, soln_imageset): + """Separate the Complements, Intersections, ImageSet lambda expr and + its base_set. This function returns the unmasked sol from different classes + of sets and also returns the appended ImageSet elements in a + soln_imageset dict: `{unmasked element: ImageSet}`. + """ + # if there is union, then need to check + # Complement, Intersection, Imageset. + # Order should not be changed. + if isinstance(sol, ConditionSet): + # extracts any solution in ConditionSet + sol = sol.base_set + + if isinstance(sol, Complement): + # extract solution and complement + complements[sym] = sol.args[1] + sol = sol.args[0] + # complement will be added at the end + # using `add_intersection_complement` method + + # if there is union of Imageset or other in soln. + # no testcase is written for this if block + if isinstance(sol, Union): + sol_args = sol.args + sol = S.EmptySet + # We need in sequence so append finteset elements + # and then imageset or other. + for sol_arg2 in sol_args: + if isinstance(sol_arg2, FiniteSet): + sol += sol_arg2 + else: + # ImageSet, Intersection, complement then + # append them directly + sol += FiniteSet(sol_arg2) + + if isinstance(sol, Intersection): + # Interval/Set will be at 0th index always + if sol.args[0] not in (S.Reals, S.Complexes): + # Sometimes solveset returns soln with intersection + # S.Reals or S.Complexes. We don't consider that + # intersection. + intersections[sym] = sol.args[0] + sol = sol.args[1] + # after intersection and complement Imageset should + # be checked. + if isinstance(sol, ImageSet): + soln_imagest = sol + expr2 = sol.lamda.expr + sol = FiniteSet(expr2) + soln_imageset[expr2] = soln_imagest + + if not isinstance(sol, FiniteSet): + sol = FiniteSet(sol) + return sol, soln_imageset + + def _check_exclude(rnew, imgset_yes): + rnew_ = rnew + if imgset_yes: + # replace all dummy variables (Imageset lambda variables) + # with zero before `checksol`. Considering fundamental soln + # for `checksol`. + rnew_copy = rnew.copy() + dummy_n = imgset_yes[0] + for key_res, value_res in rnew_copy.items(): + rnew_copy[key_res] = value_res.subs(dummy_n, 0) + rnew_ = rnew_copy + # satisfy_exclude == true if it satisfies the expr of `exclude` list. + try: + # something like : `Mod(-log(3), 2*I*pi)` can't be + # simplified right now, so `checksol` returns `TypeError`. + # when this issue is fixed this try block should be + # removed. Mod(-log(3), 2*I*pi) == -log(3) + satisfy_exclude = any( + checksol(d, rnew_) for d in exclude) + except TypeError: + satisfy_exclude = None + return satisfy_exclude + + def _restore_imgset(rnew, original_imageset, newresult): + restore_sym = set(rnew.keys()) & \ + set(original_imageset.keys()) + for key_sym in restore_sym: + img = original_imageset[key_sym] + rnew[key_sym] = img + if rnew not in newresult: + newresult.append(rnew) + + def _append_eq(eq, result, res, delete_soln, n=None): + u = Dummy('u') + if n: + eq = eq.subs(n, 0) + satisfy = eq if eq in (True, False) else checksol(u, u, eq, minimal=True) + if satisfy is False: + delete_soln = True + res = {} + else: + result.append(res) + return result, res, delete_soln + + def _append_new_soln(rnew, sym, sol, imgset_yes, soln_imageset, + original_imageset, newresult, eq=None): + """If `rnew` (A dict ) contains valid soln + append it to `newresult` list. + `imgset_yes` is (base, dummy_var) if there was imageset in previously + calculated result(otherwise empty tuple). `original_imageset` is dict + of imageset expr and imageset from this result. + `soln_imageset` dict of imageset expr and imageset of new soln. + """ + satisfy_exclude = _check_exclude(rnew, imgset_yes) + delete_soln = False + # soln should not satisfy expr present in `exclude` list. + if not satisfy_exclude: + local_n = None + # if it is imageset + if imgset_yes: + local_n = imgset_yes[0] + base = imgset_yes[1] + if sym and sol: + # when `sym` and `sol` is `None` means no new + # soln. In that case we will append rnew directly after + # substituting original imagesets in rnew values if present + # (second last line of this function using _restore_imgset) + dummy_list = list(sol.atoms(Dummy)) + # use one dummy `n` which is in + # previous imageset + local_n_list = [ + local_n for i in range( + 0, len(dummy_list))] + + dummy_zip = zip(dummy_list, local_n_list) + lam = Lambda(local_n, sol.subs(dummy_zip)) + rnew[sym] = ImageSet(lam, base) + if eq is not None: + newresult, rnew, delete_soln = _append_eq( + eq, newresult, rnew, delete_soln, local_n) + elif eq is not None: + newresult, rnew, delete_soln = _append_eq( + eq, newresult, rnew, delete_soln) + elif sol in soln_imageset.keys(): + rnew[sym] = soln_imageset[sol] + # restore original imageset + _restore_imgset(rnew, original_imageset, newresult) + else: + newresult.append(rnew) + elif satisfy_exclude: + delete_soln = True + rnew = {} + _restore_imgset(rnew, original_imageset, newresult) + return newresult, delete_soln + + def _new_order_result(result, eq): + # separate first, second priority. `res` that makes `eq` value equals + # to zero, should be used first then other result(second priority). + # If it is not done then we may miss some soln. + first_priority = [] + second_priority = [] + for res in result: + if not any(isinstance(val, ImageSet) for val in res.values()): + if eq.subs(res) == 0: + first_priority.append(res) + else: + second_priority.append(res) + if first_priority or second_priority: + return first_priority + second_priority + return result + + def _solve_using_known_values(result, solver): + """Solves the system using already known solution + (result contains the dict ). + solver is :func:`~.solveset_complex` or :func:`~.solveset_real`. + """ + # stores imageset . + soln_imageset = {} + total_solvest_call = 0 + total_conditionst = 0 + + # sort equations so the one with the fewest potential + # symbols appears first + for index, eq in enumerate(eqs_in_better_order): + newresult = [] + # if imageset, expr is used to solve for other symbol + imgset_yes = False + for res in result: + original_imageset = {} + got_symbol = set() # symbols solved in one iteration + # find the imageset and use its expr. + for k, v in res.items(): + if isinstance(v, ImageSet): + res[k] = v.lamda.expr + original_imageset[k] = v + dummy_n = v.lamda.expr.atoms(Dummy).pop() + (base,) = v.base_sets + imgset_yes = (dummy_n, base) + assert not isinstance(v, FiniteSet) # if so, internal error + # update eq with everything that is known so far + eq2 = eq.subs(res).expand() + if imgset_yes and not eq2.has(imgset_yes[0]): + # The substituted equation simplified in such a way that + # it's no longer necessary to encapsulate a potential new + # solution in an ImageSet. (E.g. at the previous step some + # {n*2*pi} was found as partial solution for one of the + # unknowns, but its main solution expression n*2*pi has now + # been substituted in a trigonometric function.) + imgset_yes = False + + unsolved_syms = _unsolved_syms(eq2, sort=True) + if not unsolved_syms: + if res: + newresult, delete_res = _append_new_soln( + res, None, None, imgset_yes, soln_imageset, + original_imageset, newresult, eq2) + if delete_res: + # `delete_res` is true, means substituting `res` in + # eq2 doesn't return `zero` or deleting the `res` + # (a soln) since it satisfies expr of `exclude` + # list. + result.remove(res) + continue # skip as it's independent of desired symbols + depen1, depen2 = eq2.as_independent(*unsolved_syms) + if (depen1.has(Abs) or depen2.has(Abs)) and solver == solveset_complex: + # Absolute values cannot be inverted in the + # complex domain + continue + soln_imageset = {} + for sym in unsolved_syms: + not_solvable = False + try: + soln = solver(eq2, sym) + total_solvest_call += 1 + soln_new = S.EmptySet + if isinstance(soln, Complement): + # separate solution and complement + complements[sym] = soln.args[1] + soln = soln.args[0] + # complement will be added at the end + if isinstance(soln, Intersection): + # Interval will be at 0th index always + if soln.args[0] != Interval(-oo, oo): + # sometimes solveset returns soln + # with intersection S.Reals, to confirm that + # soln is in domain=S.Reals + intersections[sym] = soln.args[0] + soln_new += soln.args[1] + soln = soln_new if soln_new else soln + if index > 0 and solver == solveset_real: + # one symbol's real soln, another symbol may have + # corresponding complex soln. + if not isinstance(soln, (ImageSet, ConditionSet)): + soln += solveset_complex(eq2, sym) # might give ValueError with Abs + except (NotImplementedError, ValueError): + # If solveset is not able to solve equation `eq2`. Next + # time we may get soln using next equation `eq2` + continue + if isinstance(soln, ConditionSet): + if soln.base_set in (S.Reals, S.Complexes): + soln = S.EmptySet + # don't do `continue` we may get soln + # in terms of other symbol(s) + not_solvable = True + total_conditionst += 1 + else: + soln = soln.base_set + + if soln is not S.EmptySet: + soln, soln_imageset = _extract_main_soln( + sym, soln, soln_imageset) + + for sol in soln: + # sol is not a `Union` since we checked it + # before this loop + sol, soln_imageset = _extract_main_soln( + sym, sol, soln_imageset) + sol = set(sol).pop() # XXX what if there are more solutions? + free = sol.free_symbols + if got_symbol and any( + ss in free for ss in got_symbol + ): + # sol depends on previously solved symbols + # then continue + continue + rnew = res.copy() + # put each solution in res and append the new result + # in the new result list (solution for symbol `s`) + # along with old results. + for k, v in res.items(): + if isinstance(v, Expr) and isinstance(sol, Expr): + # if any unsolved symbol is present + # Then subs known value + rnew[k] = v.subs(sym, sol) + # and add this new solution + if sol in soln_imageset.keys(): + # replace all lambda variables with 0. + imgst = soln_imageset[sol] + rnew[sym] = imgst.lamda( + *[0 for i in range(0, len( + imgst.lamda.variables))]) + else: + rnew[sym] = sol + newresult, delete_res = _append_new_soln( + rnew, sym, sol, imgset_yes, soln_imageset, + original_imageset, newresult) + if delete_res: + # deleting the `res` (a soln) since it satisfies + # eq of `exclude` list + result.remove(res) + # solution got for sym + if not not_solvable: + got_symbol.add(sym) + # next time use this new soln + if newresult: + result = newresult + return result, total_solvest_call, total_conditionst + + new_result_real, solve_call1, cnd_call1 = _solve_using_known_values( + old_result, solveset_real) + new_result_complex, solve_call2, cnd_call2 = _solve_using_known_values( + old_result, solveset_complex) + + # If total_solveset_call is equal to total_conditionset + # then solveset failed to solve all of the equations. + # In this case we return a ConditionSet here. + total_conditionset += (cnd_call1 + cnd_call2) + total_solveset_call += (solve_call1 + solve_call2) + + if total_conditionset == total_solveset_call and total_solveset_call != -1: + return _return_conditionset(eqs_in_better_order, all_symbols) + + # don't keep duplicate solutions + filtered_complex = [] + for i in list(new_result_complex): + for j in list(new_result_real): + if i.keys() != j.keys(): + continue + if all(a.dummy_eq(b) for a, b in zip(i.values(), j.values()) \ + if not (isinstance(a, int) and isinstance(b, int))): + break + else: + filtered_complex.append(i) + # overall result + result = new_result_real + filtered_complex + + result_all_variables = [] + result_infinite = [] + for res in result: + if not res: + # means {None : None} + continue + # If length < len(all_symbols) means infinite soln. + # Some or all the soln is dependent on 1 symbol. + # eg. {x: y+2} then final soln {x: y+2, y: y} + if len(res) < len(all_symbols): + solved_symbols = res.keys() + unsolved = list(filter( + lambda x: x not in solved_symbols, all_symbols)) + for unsolved_sym in unsolved: + res[unsolved_sym] = unsolved_sym + result_infinite.append(res) + if res not in result_all_variables: + result_all_variables.append(res) + + if result_infinite: + # we have general soln + # eg : [{x: -1, y : 1}, {x : -y, y: y}] then + # return [{x : -y, y : y}] + result_all_variables = result_infinite + if intersections or complements: + result_all_variables = add_intersection_complement( + result_all_variables, intersections, complements) + + # convert to ordered tuple + result = S.EmptySet + for r in result_all_variables: + temp = [r[symb] for symb in all_symbols] + result += FiniteSet(tuple(temp)) + return result + + +def _solveset_work(system, symbols): + soln = solveset(system[0], symbols[0]) + if isinstance(soln, FiniteSet): + _soln = FiniteSet(*[(s,) for s in soln]) + return _soln + else: + return FiniteSet(tuple(FiniteSet(soln))) + + +def _handle_positive_dimensional(polys, symbols, denominators): + from sympy.polys.polytools import groebner + # substitution method where new system is groebner basis of the system + _symbols = list(symbols) + _symbols.sort(key=default_sort_key) + basis = groebner(polys, _symbols, polys=True) + new_system = [] + for poly_eq in basis: + new_system.append(poly_eq.as_expr()) + result = [{}] + result = substitution( + new_system, symbols, result, [], + denominators) + return result + + +def _handle_zero_dimensional(polys, symbols, system): + # solve 0 dimensional poly system using `solve_poly_system` + result = solve_poly_system(polys, *symbols) + # May be some extra soln is added because + # we used `unrad` in `_separate_poly_nonpoly`, so + # need to check and remove if it is not a soln. + result_update = S.EmptySet + for res in result: + dict_sym_value = dict(list(zip(symbols, res))) + if all(checksol(eq, dict_sym_value) for eq in system): + result_update += FiniteSet(res) + return result_update + + +def _separate_poly_nonpoly(system, symbols): + polys = [] + polys_expr = [] + nonpolys = [] + # unrad_changed stores a list of expressions containing + # radicals that were processed using unrad + # this is useful if solutions need to be checked later. + unrad_changed = [] + denominators = set() + poly = None + for eq in system: + # Store denom expressions that contain symbols + denominators.update(_simple_dens(eq, symbols)) + # Convert equality to expression + if isinstance(eq, Eq): + eq = eq.lhs - eq.rhs + # try to remove sqrt and rational power + without_radicals = unrad(simplify(eq), *symbols) + if without_radicals: + unrad_changed.append(eq) + eq_unrad, cov = without_radicals + if not cov: + eq = eq_unrad + if isinstance(eq, Expr): + eq = eq.as_numer_denom()[0] + poly = eq.as_poly(*symbols, extension=True) + elif simplify(eq).is_number: + continue + if poly is not None: + polys.append(poly) + polys_expr.append(poly.as_expr()) + else: + nonpolys.append(eq) + return polys, polys_expr, nonpolys, denominators, unrad_changed + + +def _handle_poly(polys, symbols): + # _handle_poly(polys, symbols) -> (poly_sol, poly_eqs) + # + # We will return possible solution information to nonlinsolve as well as a + # new system of polynomial equations to be solved if we cannot solve + # everything directly here. The new system of polynomial equations will be + # a lex-order Groebner basis for the original system. The lex basis + # hopefully separate some of the variables and equations and give something + # easier for substitution to work with. + + # The format for representing solution sets in nonlinsolve and substitution + # is a list of dicts. These are the special cases: + no_information = [{}] # No equations solved yet + no_solutions = [] # The system is inconsistent and has no solutions. + + # If there is no need to attempt further solution of these equations then + # we return no equations: + no_equations = [] + + inexact = any(not p.domain.is_Exact for p in polys) + if inexact: + # The use of Groebner over RR is likely to result incorrectly in an + # inconsistent Groebner basis. So, convert any float coefficients to + # Rational before computing the Groebner basis. + polys = [poly(nsimplify(p, rational=True)) for p in polys] + + # Compute a Groebner basis in grevlex order wrt the ordering given. We will + # try to convert this to lex order later. Usually it seems to be more + # efficient to compute a lex order basis by computing a grevlex basis and + # converting to lex with fglm. + basis = groebner(polys, symbols, order='grevlex', polys=False) + + # + # No solutions (inconsistent equations)? + # + if 1 in basis: + + # No solutions: + poly_sol = no_solutions + poly_eqs = no_equations + + # + # Finite number of solutions (zero-dimensional case) + # + elif basis.is_zero_dimensional: + + # Convert Groebner basis to lex ordering + basis = basis.fglm('lex') + + # Convert polynomial coefficients back to float before calling + # solve_poly_system + if inexact: + basis = [nfloat(p) for p in basis] + + # Solve the zero-dimensional case using solve_poly_system if possible. + # If some polynomials have factors that cannot be solved in radicals + # then this will fail. Using solve_poly_system(..., strict=True) + # ensures that we either get a complete solution set in radicals or + # UnsolvableFactorError will be raised. + try: + result = solve_poly_system(basis, *symbols, strict=True) + except UnsolvableFactorError: + # Failure... not fully solvable in radicals. Return the lex-order + # basis for substitution to handle. + poly_sol = no_information + poly_eqs = list(basis) + else: + # Success! We have a finite solution set and solve_poly_system has + # succeeded in finding all solutions. Return the solutions and also + # an empty list of remaining equations to be solved. + poly_sol = [dict(zip(symbols, res)) for res in result] + poly_eqs = no_equations + + # + # Infinite families of solutions (positive-dimensional case) + # + else: + # In this case the grevlex basis cannot be converted to lex using the + # fglm method and also solve_poly_system cannot solve the equations. We + # would like to return a lex basis but since we can't use fglm we + # compute the lex basis directly here. The time required to recompute + # the basis is generally significantly less than the time required by + # substitution to solve the new system. + poly_sol = no_information + poly_eqs = list(groebner(polys, symbols, order='lex', polys=False)) + + if inexact: + poly_eqs = [nfloat(p) for p in poly_eqs] + + return poly_sol, poly_eqs + + +def nonlinsolve(system, *symbols): + r""" + Solve system of $N$ nonlinear equations with $M$ variables, which means both + under and overdetermined systems are supported. Positive dimensional + system is also supported (A system with infinitely many solutions is said + to be positive-dimensional). In a positive dimensional system the solution will + be dependent on at least one symbol. Returns both real solution + and complex solution (if they exist). + + Parameters + ========== + + system : list of equations + The target system of equations + symbols : list of Symbols + symbols should be given as a sequence eg. list + + Returns + ======= + + A :class:`~.FiniteSet` of ordered tuple of values of `symbols` for which the `system` + has solution. Order of values in the tuple is same as symbols present in + the parameter `symbols`. + + Please note that general :class:`~.FiniteSet` is unordered, the solution + returned here is not simply a :class:`~.FiniteSet` of solutions, rather it + is a :class:`~.FiniteSet` of ordered tuple, i.e. the first and only + argument to :class:`~.FiniteSet` is a tuple of solutions, which is + ordered, and, hence ,the returned solution is ordered. + + Also note that solution could also have been returned as an ordered tuple, + FiniteSet is just a wrapper ``{}`` around the tuple. It has no other + significance except for the fact it is just used to maintain a consistent + output format throughout the solveset. + + For the given set of equations, the respective input types + are given below: + + .. math:: xy - 1 = 0 + .. math:: 4x^2 + y^2 - 5 = 0 + + :: + + system = [x*y - 1, 4*x**2 + y**2 - 5] + symbols = [x, y] + + Raises + ====== + + ValueError + The input is not valid. + The symbols are not given. + AttributeError + The input symbols are not `Symbol` type. + + Examples + ======== + + >>> from sympy import symbols, nonlinsolve + >>> x, y, z = symbols('x, y, z', real=True) + >>> nonlinsolve([x*y - 1, 4*x**2 + y**2 - 5], [x, y]) + {(-1, -1), (-1/2, -2), (1/2, 2), (1, 1)} + + 1. Positive dimensional system and complements: + + >>> from sympy import pprint + >>> from sympy.polys.polytools import is_zero_dimensional + >>> a, b, c, d = symbols('a, b, c, d', extended_real=True) + >>> eq1 = a + b + c + d + >>> eq2 = a*b + b*c + c*d + d*a + >>> eq3 = a*b*c + b*c*d + c*d*a + d*a*b + >>> eq4 = a*b*c*d - 1 + >>> system = [eq1, eq2, eq3, eq4] + >>> is_zero_dimensional(system) + False + >>> pprint(nonlinsolve(system, [a, b, c, d]), use_unicode=False) + -1 1 1 -1 + {(---, -d, -, {d} \ {0}), (-, -d, ---, {d} \ {0})} + d d d d + >>> nonlinsolve([(x+y)**2 - 4, x + y - 2], [x, y]) + {(2 - y, y)} + + 2. If some of the equations are non-polynomial then `nonlinsolve` + will call the ``substitution`` function and return real and complex solutions, + if present. + + >>> from sympy import exp, sin + >>> nonlinsolve([exp(x) - sin(y), y**2 - 4], [x, y]) + {(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2), + (ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2)} + + 3. If system is non-linear polynomial and zero-dimensional then it + returns both solution (real and complex solutions, if present) using + :func:`~.solve_poly_system`: + + >>> from sympy import sqrt + >>> nonlinsolve([x**2 - 2*y**2 -2, x*y - 2], [x, y]) + {(-2, -1), (2, 1), (-sqrt(2)*I, sqrt(2)*I), (sqrt(2)*I, -sqrt(2)*I)} + + 4. ``nonlinsolve`` can solve some linear (zero or positive dimensional) + system (because it uses the :func:`sympy.polys.polytools.groebner` function to get the + groebner basis and then uses the ``substitution`` function basis as the + new `system`). But it is not recommended to solve linear system using + ``nonlinsolve``, because :func:`~.linsolve` is better for general linear systems. + + >>> nonlinsolve([x + 2*y -z - 3, x - y - 4*z + 9, y + z - 4], [x, y, z]) + {(3*z - 5, 4 - z, z)} + + 5. System having polynomial equations and only real solution is + solved using :func:`~.solve_poly_system`: + + >>> e1 = sqrt(x**2 + y**2) - 10 + >>> e2 = sqrt(y**2 + (-x + 10)**2) - 3 + >>> nonlinsolve((e1, e2), (x, y)) + {(191/20, -3*sqrt(391)/20), (191/20, 3*sqrt(391)/20)} + >>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [x, y]) + {(1, 2), (1 - sqrt(5), 2 + sqrt(5)), (1 + sqrt(5), 2 - sqrt(5))} + >>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [y, x]) + {(2, 1), (2 - sqrt(5), 1 + sqrt(5)), (2 + sqrt(5), 1 - sqrt(5))} + + 6. It is better to use symbols instead of trigonometric functions or + :class:`~.Function`. For example, replace $\sin(x)$ with a symbol, replace + $f(x)$ with a symbol and so on. Get a solution from ``nonlinsolve`` and then + use :func:`~.solveset` to get the value of $x$. + + How nonlinsolve is better than old solver ``_solve_system`` : + ============================================================= + + 1. A positive dimensional system solver: nonlinsolve can return + solution for positive dimensional system. It finds the + Groebner Basis of the positive dimensional system(calling it as + basis) then we can start solving equation(having least number of + variable first in the basis) using solveset and substituting that + solved solutions into other equation(of basis) to get solution in + terms of minimum variables. Here the important thing is how we + are substituting the known values and in which equations. + + 2. Real and complex solutions: nonlinsolve returns both real + and complex solution. If all the equations in the system are polynomial + then using :func:`~.solve_poly_system` both real and complex solution is returned. + If all the equations in the system are not polynomial equation then goes to + ``substitution`` method with this polynomial and non polynomial equation(s), + to solve for unsolved variables. Here to solve for particular variable + solveset_real and solveset_complex is used. For both real and complex + solution ``_solve_using_known_values`` is used inside ``substitution`` + (``substitution`` will be called when any non-polynomial equation is present). + If a solution is valid its general solution is added to the final result. + + 3. :class:`~.Complement` and :class:`~.Intersection` will be added: + nonlinsolve maintains dict for complements and intersections. If solveset + find complements or/and intersections with any interval or set during the + execution of ``substitution`` function, then complement or/and + intersection for that variable is added before returning final solution. + + """ + if not system: + return S.EmptySet + + if not symbols: + msg = ('Symbols must be given, for which solution of the ' + 'system is to be found.') + raise ValueError(filldedent(msg)) + + if hasattr(symbols[0], '__iter__'): + symbols = symbols[0] + + if not is_sequence(symbols) or not symbols: + msg = ('Symbols must be given, for which solution of the ' + 'system is to be found.') + raise IndexError(filldedent(msg)) + + symbols = list(map(_sympify, symbols)) + system, symbols, swap = recast_to_symbols(system, symbols) + if swap: + soln = nonlinsolve(system, symbols) + return FiniteSet(*[tuple(i.xreplace(swap) for i in s) for s in soln]) + + if len(system) == 1 and len(symbols) == 1: + return _solveset_work(system, symbols) + + # main code of def nonlinsolve() starts from here + + polys, polys_expr, nonpolys, denominators, unrad_changed = \ + _separate_poly_nonpoly(system, symbols) + + poly_eqs = [] + poly_sol = [{}] + + if polys: + poly_sol, poly_eqs = _handle_poly(polys, symbols) + if poly_sol and poly_sol[0]: + poly_syms = set().union(*(eq.free_symbols for eq in polys)) + unrad_syms = set().union(*(eq.free_symbols for eq in unrad_changed)) + if unrad_syms == poly_syms and unrad_changed: + # if all the symbols have been solved by _handle_poly + # and unrad has been used then check solutions + poly_sol = [sol for sol in poly_sol if checksol(unrad_changed, sol)] + + # Collect together the unsolved polynomials with the non-polynomial + # equations. + remaining = poly_eqs + nonpolys + + # to_tuple converts a solution dictionary to a tuple containing the + # value for each symbol + to_tuple = lambda sol: tuple(sol[s] for s in symbols) + + if not remaining: + # If there is nothing left to solve then return the solution from + # solve_poly_system directly. + return FiniteSet(*map(to_tuple, poly_sol)) + else: + # Here we handle: + # + # 1. The Groebner basis if solve_poly_system failed. + # 2. The Groebner basis in the positive-dimensional case. + # 3. Any non-polynomial equations + # + # If solve_poly_system did succeed then we pass those solutions in as + # preliminary results. + subs_res = substitution(remaining, symbols, result=poly_sol, exclude=denominators) + + if not isinstance(subs_res, FiniteSet): + return subs_res + + # check solutions produced by substitution. Currently, checking is done for + # only those solutions which have non-Set variable values. + if unrad_changed: + result = [dict(zip(symbols, sol)) for sol in subs_res.args] + correct_sols = [sol for sol in result if any(isinstance(v, Set) for v in sol) + or checksol(unrad_changed, sol) != False] + return FiniteSet(*map(to_tuple, correct_sols)) + else: + return subs_res diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_constantsimp.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_constantsimp.py new file mode 100644 index 0000000000000000000000000000000000000000..efb966a4c8c2f93558d05e7c330f06530e69180c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_constantsimp.py @@ -0,0 +1,179 @@ +""" +If the arbitrary constant class from issue 4435 is ever implemented, this +should serve as a set of test cases. +""" + +from sympy.core.function import Function +from sympy.core.numbers import I +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (cosh, sinh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, cos, sin) +from sympy.integrals.integrals import Integral +from sympy.solvers.ode.ode import constantsimp, constant_renumber +from sympy.testing.pytest import XFAIL + + +x = Symbol('x') +y = Symbol('y') +z = Symbol('z') +u2 = Symbol('u2') +_a = Symbol('_a') +C1 = Symbol('C1') +C2 = Symbol('C2') +C3 = Symbol('C3') +f = Function('f') + + +def test_constant_mul(): + # We want C1 (Constant) below to absorb the y's, but not the x's + assert constant_renumber(constantsimp(y*C1, [C1])) == C1*y + assert constant_renumber(constantsimp(C1*y, [C1])) == C1*y + assert constant_renumber(constantsimp(x*C1, [C1])) == x*C1 + assert constant_renumber(constantsimp(C1*x, [C1])) == x*C1 + assert constant_renumber(constantsimp(2*C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1*2, [C1])) == C1 + assert constant_renumber(constantsimp(y*C1*x, [C1, y])) == C1*x + assert constant_renumber(constantsimp(x*y*C1, [C1, y])) == x*C1 + assert constant_renumber(constantsimp(y*x*C1, [C1, y])) == x*C1 + assert constant_renumber(constantsimp(C1*x*y, [C1, y])) == C1*x + assert constant_renumber(constantsimp(x*C1*y, [C1, y])) == x*C1 + assert constant_renumber(constantsimp(C1*y*(y + 1), [C1])) == C1*y*(y+1) + assert constant_renumber(constantsimp(y*C1*(y + 1), [C1])) == C1*y*(y+1) + assert constant_renumber(constantsimp(x*(y*C1), [C1])) == x*y*C1 + assert constant_renumber(constantsimp(x*(C1*y), [C1])) == x*y*C1 + assert constant_renumber(constantsimp(C1*(x*y), [C1, y])) == C1*x + assert constant_renumber(constantsimp((x*y)*C1, [C1, y])) == x*C1 + assert constant_renumber(constantsimp((y*x)*C1, [C1, y])) == x*C1 + assert constant_renumber(constantsimp(y*(y + 1)*C1, [C1, y])) == C1 + assert constant_renumber(constantsimp((C1*x)*y, [C1, y])) == C1*x + assert constant_renumber(constantsimp(y*(x*C1), [C1, y])) == x*C1 + assert constant_renumber(constantsimp((x*C1)*y, [C1, y])) == x*C1 + assert constant_renumber(constantsimp(C1*x*y*x*y*2, [C1, y])) == C1*x**2 + assert constant_renumber(constantsimp(C1*x*y*z, [C1, y, z])) == C1*x + assert constant_renumber(constantsimp(C1*x*y**2*sin(z), [C1, y, z])) == C1*x + assert constant_renumber(constantsimp(C1*C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1*C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C2*C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C1*C1*C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C1*x*2**x, [C1])) == C1*x*2**x + +def test_constant_add(): + assert constant_renumber(constantsimp(C1 + C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1 + 2, [C1])) == C1 + assert constant_renumber(constantsimp(2 + C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1 + y, [C1, y])) == C1 + assert constant_renumber(constantsimp(C1 + x, [C1])) == C1 + x + assert constant_renumber(constantsimp(C1 + C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1 + C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C2 + C1, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C1 + C2 + C1, [C1, C2])) == C1 + + +def test_constant_power_as_base(): + assert constant_renumber(constantsimp(C1**C1, [C1])) == C1 + assert constant_renumber(constantsimp(Pow(C1, C1), [C1])) == C1 + assert constant_renumber(constantsimp(C1**C1, [C1])) == C1 + assert constant_renumber(constantsimp(C1**C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C2**C1, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C2**C2, [C1, C2])) == C1 + assert constant_renumber(constantsimp(C1**y, [C1, y])) == C1 + assert constant_renumber(constantsimp(C1**x, [C1])) == C1**x + assert constant_renumber(constantsimp(C1**2, [C1])) == C1 + assert constant_renumber( + constantsimp(C1**(x*y), [C1])) == C1**(x*y) + + +def test_constant_power_as_exp(): + assert constant_renumber(constantsimp(x**C1, [C1])) == x**C1 + assert constant_renumber(constantsimp(y**C1, [C1, y])) == C1 + assert constant_renumber(constantsimp(x**y**C1, [C1, y])) == x**C1 + assert constant_renumber( + constantsimp((x**y)**C1, [C1])) == (x**y)**C1 + assert constant_renumber( + constantsimp(x**(y**C1), [C1, y])) == x**C1 + assert constant_renumber(constantsimp(x**C1**y, [C1, y])) == x**C1 + assert constant_renumber( + constantsimp(x**(C1**y), [C1, y])) == x**C1 + assert constant_renumber( + constantsimp((x**C1)**y, [C1])) == (x**C1)**y + assert constant_renumber(constantsimp(2**C1, [C1])) == C1 + assert constant_renumber(constantsimp(S(2)**C1, [C1])) == C1 + assert constant_renumber(constantsimp(exp(C1), [C1])) == C1 + assert constant_renumber( + constantsimp(exp(C1 + x), [C1])) == C1*exp(x) + assert constant_renumber(constantsimp(Pow(2, C1), [C1])) == C1 + + +def test_constant_function(): + assert constant_renumber(constantsimp(sin(C1), [C1])) == C1 + assert constant_renumber(constantsimp(f(C1), [C1])) == C1 + assert constant_renumber(constantsimp(f(C1, C1), [C1])) == C1 + assert constant_renumber(constantsimp(f(C1, C2), [C1, C2])) == C1 + assert constant_renumber(constantsimp(f(C2, C1), [C1, C2])) == C1 + assert constant_renumber(constantsimp(f(C2, C2), [C1, C2])) == C1 + assert constant_renumber( + constantsimp(f(C1, x), [C1])) == f(C1, x) + assert constant_renumber(constantsimp(f(C1, y), [C1, y])) == C1 + assert constant_renumber(constantsimp(f(y, C1), [C1, y])) == C1 + assert constant_renumber(constantsimp(f(C1, y, C2), [C1, C2, y])) == C1 + + +def test_constant_function_multiple(): + # The rules to not renumber in this case would be too complicated, and + # dsolve is not likely to ever encounter anything remotely like this. + assert constant_renumber( + constantsimp(f(C1, C1, x), [C1])) == f(C1, C1, x) + + +def test_constant_multiple(): + assert constant_renumber(constantsimp(C1*2 + 2, [C1])) == C1 + assert constant_renumber(constantsimp(x*2/C1, [C1])) == C1*x + assert constant_renumber(constantsimp(C1**2*2 + 2, [C1])) == C1 + assert constant_renumber( + constantsimp(sin(2*C1) + x + sqrt(2), [C1])) == C1 + x + assert constant_renumber(constantsimp(2*C1 + C2, [C1, C2])) == C1 + +def test_constant_repeated(): + assert C1 + C1*x == constant_renumber( C1 + C1*x) + +def test_ode_solutions(): + # only a few examples here, the rest will be tested in the actual dsolve tests + assert constant_renumber(constantsimp(C1*exp(2*x) + exp(x)*(C2 + C3), [C1, C2, C3])) == \ + constant_renumber(C1*exp(x) + C2*exp(2*x)) + assert constant_renumber( + constantsimp(Eq(f(x), I*C1*sinh(x/3) + C2*cosh(x/3)), [C1, C2]) + ) == constant_renumber(Eq(f(x), C1*sinh(x/3) + C2*cosh(x/3))) + assert constant_renumber(constantsimp(Eq(f(x), acos((-C1)/cos(x))), [C1])) == \ + Eq(f(x), acos(C1/cos(x))) + assert constant_renumber( + constantsimp(Eq(log(f(x)/C1) + 2*exp(x/f(x)), 0), [C1]) + ) == Eq(log(C1*f(x)) + 2*exp(x/f(x)), 0) + assert constant_renumber(constantsimp(Eq(log(x*sqrt(2)*sqrt(1/x)*sqrt(f(x)) + /C1) + x**2/(2*f(x)**2), 0), [C1])) == \ + Eq(log(C1*sqrt(x)*sqrt(f(x))) + x**2/(2*f(x)**2), 0) + assert constant_renumber(constantsimp(Eq(-exp(-f(x)/x)*sin(f(x)/x)/2 + log(x/C1) - + cos(f(x)/x)*exp(-f(x)/x)/2, 0), [C1])) == \ + Eq(-exp(-f(x)/x)*sin(f(x)/x)/2 + log(C1*x) - cos(f(x)/x)* + exp(-f(x)/x)/2, 0) + assert constant_renumber(constantsimp(Eq(-Integral(-1/(sqrt(1 - u2**2)*u2), + (u2, _a, x/f(x))) + log(f(x)/C1), 0), [C1])) == \ + Eq(-Integral(-1/(u2*sqrt(1 - u2**2)), (u2, _a, x/f(x))) + + log(C1*f(x)), 0) + assert [constantsimp(i, [C1]) for i in [Eq(f(x), sqrt(-C1*x + x**2)), Eq(f(x), -sqrt(-C1*x + x**2))]] == \ + [Eq(f(x), sqrt(x*(C1 + x))), Eq(f(x), -sqrt(x*(C1 + x)))] + + +@XFAIL +def test_nonlocal_simplification(): + assert constantsimp(C1 + C2+x*C2, [C1, C2]) == C1 + C2*x + + +def test_constant_Eq(): + # C1 on the rhs is well-tested, but the lhs is only tested here + assert constantsimp(Eq(C1, 3 + f(x)*x), [C1]) == Eq(x*f(x), C1) + assert constantsimp(Eq(C1, 3 * f(x)*x), [C1]) == Eq(f(x)*x, C1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_decompogen.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_decompogen.py new file mode 100644 index 0000000000000000000000000000000000000000..1ba03f4b42558231b626b6ed169f8b0a81a72bf9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_decompogen.py @@ -0,0 +1,59 @@ +from sympy.solvers.decompogen import decompogen, compogen +from sympy.core.symbol import symbols +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt, Max +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.testing.pytest import XFAIL, raises + +x, y = symbols('x y') + + +def test_decompogen(): + assert decompogen(sin(cos(x)), x) == [sin(x), cos(x)] + assert decompogen(sin(x)**2 + sin(x) + 1, x) == [x**2 + x + 1, sin(x)] + assert decompogen(sqrt(6*x**2 - 5), x) == [sqrt(x), 6*x**2 - 5] + assert decompogen(sin(sqrt(cos(x**2 + 1))), x) == [sin(x), sqrt(x), cos(x), x**2 + 1] + assert decompogen(Abs(cos(x)**2 + 3*cos(x) - 4), x) == [Abs(x), x**2 + 3*x - 4, cos(x)] + assert decompogen(sin(x)**2 + sin(x) - sqrt(3)/2, x) == [x**2 + x - sqrt(3)/2, sin(x)] + assert decompogen(Abs(cos(y)**2 + 3*cos(x) - 4), x) == [Abs(x), 3*x + cos(y)**2 - 4, cos(x)] + assert decompogen(x, y) == [x] + assert decompogen(1, x) == [1] + assert decompogen(Max(3, x), x) == [Max(3, x)] + raises(TypeError, lambda: decompogen(x < 5, x)) + u = 2*x + 3 + assert decompogen(Max(sqrt(u),(u)**2), x) == [Max(sqrt(x), x**2), u] + assert decompogen(Max(u, u**2, y), x) == [Max(x, x**2, y), u] + assert decompogen(Max(sin(x), u), x) == [Max(2*x + 3, sin(x))] + + +def test_decompogen_poly(): + assert decompogen(x**4 + 2*x**2 + 1, x) == [x**2 + 2*x + 1, x**2] + assert decompogen(x**4 + 2*x**3 - x - 1, x) == [x**2 - x - 1, x**2 + x] + + +@XFAIL +def test_decompogen_fails(): + A = lambda x: x**2 + 2*x + 3 + B = lambda x: 4*x**2 + 5*x + 6 + assert decompogen(A(x*exp(x)), x) == [x**2 + 2*x + 3, x*exp(x)] + assert decompogen(A(B(x)), x) == [x**2 + 2*x + 3, 4*x**2 + 5*x + 6] + assert decompogen(A(1/x + 1/x**2), x) == [x**2 + 2*x + 3, 1/x + 1/x**2] + assert decompogen(A(1/x + 2/(x + 1)), x) == [x**2 + 2*x + 3, 1/x + 2/(x + 1)] + + +def test_compogen(): + assert compogen([sin(x), cos(x)], x) == sin(cos(x)) + assert compogen([x**2 + x + 1, sin(x)], x) == sin(x)**2 + sin(x) + 1 + assert compogen([sqrt(x), 6*x**2 - 5], x) == sqrt(6*x**2 - 5) + assert compogen([sin(x), sqrt(x), cos(x), x**2 + 1], x) == sin(sqrt( + cos(x**2 + 1))) + assert compogen([Abs(x), x**2 + 3*x - 4, cos(x)], x) == Abs(cos(x)**2 + + 3*cos(x) - 4) + assert compogen([x**2 + x - sqrt(3)/2, sin(x)], x) == (sin(x)**2 + sin(x) - + sqrt(3)/2) + assert compogen([Abs(x), 3*x + cos(y)**2 - 4, cos(x)], x) == \ + Abs(3*cos(x) + cos(y)**2 - 4) + assert compogen([x**2 + 2*x + 1, x**2], x) == x**4 + 2*x**2 + 1 + # the result is in unsimplified form + assert compogen([x**2 - x - 1, x**2 + x], x) == -x**2 - x + (x**2 + x)**2 - 1 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_inequalities.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_inequalities.py new file mode 100644 index 0000000000000000000000000000000000000000..6ce6f4520b52d8714102c95457c90d44543c685c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_inequalities.py @@ -0,0 +1,500 @@ +"""Tests for tools for solving inequalities and systems of inequalities. """ + +from sympy.concrete.summations import Sum +from sympy.core.function import Function +from sympy.core.numbers import I, Rational, oo, pi +from sympy.core.relational import Eq, Ge, Gt, Le, Lt, Ne +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import root, sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import cos, sin, tan +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import And, Or +from sympy.polys.polytools import Poly, PurePoly +from sympy.sets.sets import FiniteSet, Interval, Union +from sympy.solvers.inequalities import (reduce_inequalities, + solve_poly_inequality as psolve, + reduce_rational_inequalities, + solve_univariate_inequality as isolve, + reduce_abs_inequality, + _solve_inequality) +from sympy.polys.rootoftools import rootof +from sympy.solvers.solvers import solve +from sympy.solvers.solveset import solveset +from sympy.core.mod import Mod +from sympy.abc import x, y + +from sympy.testing.pytest import raises, XFAIL + + +inf = oo.evalf() + + +def test_solve_poly_inequality(): + assert psolve(Poly(0, x), '==') == [S.Reals] + assert psolve(Poly(1, x), '==') == [S.EmptySet] + assert psolve(PurePoly(x + 1, x), ">") == [Interval(-1, oo, True, False)] + + +def test_reduce_poly_inequalities_real_interval(): + assert reduce_rational_inequalities( + [[Eq(x**2, 0)]], x, relational=False) == FiniteSet(0) + assert reduce_rational_inequalities( + [[Le(x**2, 0)]], x, relational=False) == FiniteSet(0) + assert reduce_rational_inequalities( + [[Lt(x**2, 0)]], x, relational=False) == S.EmptySet + assert reduce_rational_inequalities( + [[Ge(x**2, 0)]], x, relational=False) == \ + S.Reals if x.is_real else Interval(-oo, oo) + assert reduce_rational_inequalities( + [[Gt(x**2, 0)]], x, relational=False) == \ + FiniteSet(0).complement(S.Reals) + assert reduce_rational_inequalities( + [[Ne(x**2, 0)]], x, relational=False) == \ + FiniteSet(0).complement(S.Reals) + + assert reduce_rational_inequalities( + [[Eq(x**2, 1)]], x, relational=False) == FiniteSet(-1, 1) + assert reduce_rational_inequalities( + [[Le(x**2, 1)]], x, relational=False) == Interval(-1, 1) + assert reduce_rational_inequalities( + [[Lt(x**2, 1)]], x, relational=False) == Interval(-1, 1, True, True) + assert reduce_rational_inequalities( + [[Ge(x**2, 1)]], x, relational=False) == \ + Union(Interval(-oo, -1), Interval(1, oo)) + assert reduce_rational_inequalities( + [[Gt(x**2, 1)]], x, relational=False) == \ + Interval(-1, 1).complement(S.Reals) + assert reduce_rational_inequalities( + [[Ne(x**2, 1)]], x, relational=False) == \ + FiniteSet(-1, 1).complement(S.Reals) + assert reduce_rational_inequalities([[Eq( + x**2, 1.0)]], x, relational=False) == FiniteSet(-1.0, 1.0).evalf() + assert reduce_rational_inequalities( + [[Le(x**2, 1.0)]], x, relational=False) == Interval(-1.0, 1.0) + assert reduce_rational_inequalities([[Lt( + x**2, 1.0)]], x, relational=False) == Interval(-1.0, 1.0, True, True) + assert reduce_rational_inequalities( + [[Ge(x**2, 1.0)]], x, relational=False) == \ + Union(Interval(-inf, -1.0), Interval(1.0, inf)) + assert reduce_rational_inequalities( + [[Gt(x**2, 1.0)]], x, relational=False) == \ + Union(Interval(-inf, -1.0, right_open=True), + Interval(1.0, inf, left_open=True)) + assert reduce_rational_inequalities([[Ne( + x**2, 1.0)]], x, relational=False) == \ + FiniteSet(-1.0, 1.0).complement(S.Reals) + + s = sqrt(2) + + assert reduce_rational_inequalities([[Lt( + x**2 - 1, 0), Gt(x**2 - 1, 0)]], x, relational=False) == S.EmptySet + assert reduce_rational_inequalities([[Le(x**2 - 1, 0), Ge( + x**2 - 1, 0)]], x, relational=False) == FiniteSet(-1, 1) + assert reduce_rational_inequalities( + [[Le(x**2 - 2, 0), Ge(x**2 - 1, 0)]], x, relational=False + ) == Union(Interval(-s, -1, False, False), Interval(1, s, False, False)) + assert reduce_rational_inequalities( + [[Le(x**2 - 2, 0), Gt(x**2 - 1, 0)]], x, relational=False + ) == Union(Interval(-s, -1, False, True), Interval(1, s, True, False)) + assert reduce_rational_inequalities( + [[Lt(x**2 - 2, 0), Ge(x**2 - 1, 0)]], x, relational=False + ) == Union(Interval(-s, -1, True, False), Interval(1, s, False, True)) + assert reduce_rational_inequalities( + [[Lt(x**2 - 2, 0), Gt(x**2 - 1, 0)]], x, relational=False + ) == Union(Interval(-s, -1, True, True), Interval(1, s, True, True)) + assert reduce_rational_inequalities( + [[Lt(x**2 - 2, 0), Ne(x**2 - 1, 0)]], x, relational=False + ) == Union(Interval(-s, -1, True, True), Interval(-1, 1, True, True), + Interval(1, s, True, True)) + + assert reduce_rational_inequalities([[Lt(x**2, -1.)]], x) is S.false + + +def test_reduce_poly_inequalities_complex_relational(): + assert reduce_rational_inequalities( + [[Eq(x**2, 0)]], x, relational=True) == Eq(x, 0) + assert reduce_rational_inequalities( + [[Le(x**2, 0)]], x, relational=True) == Eq(x, 0) + assert reduce_rational_inequalities( + [[Lt(x**2, 0)]], x, relational=True) == False + assert reduce_rational_inequalities( + [[Ge(x**2, 0)]], x, relational=True) == And(Lt(-oo, x), Lt(x, oo)) + assert reduce_rational_inequalities( + [[Gt(x**2, 0)]], x, relational=True) == \ + And(Gt(x, -oo), Lt(x, oo), Ne(x, 0)) + assert reduce_rational_inequalities( + [[Ne(x**2, 0)]], x, relational=True) == \ + And(Gt(x, -oo), Lt(x, oo), Ne(x, 0)) + + for one in (S.One, S(1.0)): + inf = one*oo + assert reduce_rational_inequalities( + [[Eq(x**2, one)]], x, relational=True) == \ + Or(Eq(x, -one), Eq(x, one)) + assert reduce_rational_inequalities( + [[Le(x**2, one)]], x, relational=True) == \ + And(And(Le(-one, x), Le(x, one))) + assert reduce_rational_inequalities( + [[Lt(x**2, one)]], x, relational=True) == \ + And(And(Lt(-one, x), Lt(x, one))) + assert reduce_rational_inequalities( + [[Ge(x**2, one)]], x, relational=True) == \ + And(Or(And(Le(one, x), Lt(x, inf)), And(Le(x, -one), Lt(-inf, x)))) + assert reduce_rational_inequalities( + [[Gt(x**2, one)]], x, relational=True) == \ + And(Or(And(Lt(-inf, x), Lt(x, -one)), And(Lt(one, x), Lt(x, inf)))) + assert reduce_rational_inequalities( + [[Ne(x**2, one)]], x, relational=True) == \ + Or(And(Lt(-inf, x), Lt(x, -one)), + And(Lt(-one, x), Lt(x, one)), + And(Lt(one, x), Lt(x, inf))) + + +def test_reduce_rational_inequalities_real_relational(): + assert reduce_rational_inequalities([], x) == False + assert reduce_rational_inequalities( + [[(x**2 + 3*x + 2)/(x**2 - 16) >= 0]], x, relational=False) == \ + Union(Interval.open(-oo, -4), Interval(-2, -1), Interval.open(4, oo)) + + assert reduce_rational_inequalities( + [[((-2*x - 10)*(3 - x))/((x**2 + 5)*(x - 2)**2) < 0]], x, + relational=False) == \ + Union(Interval.open(-5, 2), Interval.open(2, 3)) + + assert reduce_rational_inequalities([[(x + 1)/(x - 5) <= 0]], x, + relational=False) == \ + Interval.Ropen(-1, 5) + + assert reduce_rational_inequalities([[(x**2 + 4*x + 3)/(x - 1) > 0]], x, + relational=False) == \ + Union(Interval.open(-3, -1), Interval.open(1, oo)) + + assert reduce_rational_inequalities([[(x**2 - 16)/(x - 1)**2 < 0]], x, + relational=False) == \ + Union(Interval.open(-4, 1), Interval.open(1, 4)) + + assert reduce_rational_inequalities([[(3*x + 1)/(x + 4) >= 1]], x, + relational=False) == \ + Union(Interval.open(-oo, -4), Interval.Ropen(Rational(3, 2), oo)) + + assert reduce_rational_inequalities([[(x - 8)/x <= 3 - x]], x, + relational=False) == \ + Union(Interval.Lopen(-oo, -2), Interval.Lopen(0, 4)) + + # issue sympy/sympy#10237 + assert reduce_rational_inequalities( + [[x < oo, x >= 0, -oo < x]], x, relational=False) == Interval(0, oo) + + +def test_reduce_abs_inequalities(): + e = abs(x - 5) < 3 + ans = And(Lt(2, x), Lt(x, 8)) + assert reduce_inequalities(e) == ans + assert reduce_inequalities(e, x) == ans + assert reduce_inequalities(abs(x - 5)) == Eq(x, 5) + assert reduce_inequalities( + abs(2*x + 3) >= 8) == Or(And(Le(Rational(5, 2), x), Lt(x, oo)), + And(Le(x, Rational(-11, 2)), Lt(-oo, x))) + assert reduce_inequalities(abs(x - 4) + abs( + 3*x - 5) < 7) == And(Lt(S.Half, x), Lt(x, 4)) + assert reduce_inequalities(abs(x - 4) + abs(3*abs(x) - 5) < 7) == \ + Or(And(S(-2) < x, x < -1), And(S.Half < x, x < 4)) + + nr = Symbol('nr', extended_real=False) + raises(TypeError, lambda: reduce_inequalities(abs(nr - 5) < 3)) + assert reduce_inequalities(x < 3, symbols=[x, nr]) == And(-oo < x, x < 3) + + +def test_reduce_inequalities_general(): + assert reduce_inequalities(Ge(sqrt(2)*x, 1)) == And(sqrt(2)/2 <= x, x < oo) + assert reduce_inequalities(x + 1 > 0) == And(S.NegativeOne < x, x < oo) + + +def test_reduce_inequalities_boolean(): + assert reduce_inequalities( + [Eq(x**2, 0), True]) == Eq(x, 0) + assert reduce_inequalities([Eq(x**2, 0), False]) == False + assert reduce_inequalities(x**2 >= 0) is S.true # issue 10196 + + +def test_reduce_inequalities_multivariate(): + assert reduce_inequalities([Ge(x**2, 1), Ge(y**2, 1)]) == And( + Or(And(Le(S.One, x), Lt(x, oo)), And(Le(x, -1), Lt(-oo, x))), + Or(And(Le(S.One, y), Lt(y, oo)), And(Le(y, -1), Lt(-oo, y)))) + + +def test_reduce_inequalities_errors(): + raises(NotImplementedError, lambda: reduce_inequalities(Ge(sin(x) + x, 1))) + raises(NotImplementedError, lambda: reduce_inequalities(Ge(x**2*y + y, 1))) + + +def test__solve_inequalities(): + assert reduce_inequalities(x + y < 1, symbols=[x]) == (x < 1 - y) + assert reduce_inequalities(x + y >= 1, symbols=[x]) == (x < oo) & (x >= -y + 1) + assert reduce_inequalities(Eq(0, x - y), symbols=[x]) == Eq(x, y) + assert reduce_inequalities(Ne(0, x - y), symbols=[x]) == Ne(x, y) + + +def test_issue_6343(): + eq = -3*x**2/2 - x*Rational(45, 4) + Rational(33, 2) > 0 + assert reduce_inequalities(eq) == \ + And(x < Rational(-15, 4) + sqrt(401)/4, -sqrt(401)/4 - Rational(15, 4) < x) + + +def test_issue_8235(): + assert reduce_inequalities(x**2 - 1 < 0) == \ + And(S.NegativeOne < x, x < 1) + assert reduce_inequalities(x**2 - 1 <= 0) == \ + And(S.NegativeOne <= x, x <= 1) + assert reduce_inequalities(x**2 - 1 > 0) == \ + Or(And(-oo < x, x < -1), And(x < oo, S.One < x)) + assert reduce_inequalities(x**2 - 1 >= 0) == \ + Or(And(-oo < x, x <= -1), And(S.One <= x, x < oo)) + + eq = x**8 + x - 9 # we want CRootOf solns here + sol = solve(eq >= 0) + tru = Or(And(rootof(eq, 1) <= x, x < oo), And(-oo < x, x <= rootof(eq, 0))) + assert sol == tru + + # recast vanilla as real + assert solve(sqrt((-x + 1)**2) < 1) == And(S.Zero < x, x < 2) + + +def test_issue_5526(): + assert reduce_inequalities(0 <= + x + Integral(y**2, (y, 1, 3)) - 1, [x]) == \ + (x >= -Integral(y**2, (y, 1, 3)) + 1) + f = Function('f') + e = Sum(f(x), (x, 1, 3)) + assert reduce_inequalities(0 <= x + e + y**2, [x]) == \ + (x >= -y**2 - Sum(f(x), (x, 1, 3))) + + +def test_solve_univariate_inequality(): + assert isolve(x**2 >= 4, x, relational=False) == Union(Interval(-oo, -2), + Interval(2, oo)) + assert isolve(x**2 >= 4, x) == Or(And(Le(2, x), Lt(x, oo)), And(Le(x, -2), + Lt(-oo, x))) + assert isolve((x - 1)*(x - 2)*(x - 3) >= 0, x, relational=False) == \ + Union(Interval(1, 2), Interval(3, oo)) + assert isolve((x - 1)*(x - 2)*(x - 3) >= 0, x) == \ + Or(And(Le(1, x), Le(x, 2)), And(Le(3, x), Lt(x, oo))) + assert isolve((x - 1)*(x - 2)*(x - 4) < 0, x, domain = FiniteSet(0, 3)) == \ + Or(Eq(x, 0), Eq(x, 3)) + # issue 2785: + assert isolve(x**3 - 2*x - 1 > 0, x, relational=False) == \ + Union(Interval(-1, -sqrt(5)/2 + S.Half, True, True), + Interval(S.Half + sqrt(5)/2, oo, True, True)) + # issue 2794: + assert isolve(x**3 - x**2 + x - 1 > 0, x, relational=False) == \ + Interval(1, oo, True) + #issue 13105 + assert isolve((x + I)*(x + 2*I) < 0, x) == Eq(x, 0) + assert isolve(((x - 1)*(x - 2) + I)*((x - 1)*(x - 2) + 2*I) < 0, x) == Or(Eq(x, 1), Eq(x, 2)) + assert isolve((((x - 1)*(x - 2) + I)*((x - 1)*(x - 2) + 2*I))/(x - 2) > 0, x) == Eq(x, 1) + raises (ValueError, lambda: isolve((x**2 - 3*x*I + 2)/x < 0, x)) + + # numerical testing in valid() is needed + assert isolve(x**7 - x - 2 > 0, x) == \ + And(rootof(x**7 - x - 2, 0) < x, x < oo) + + # handle numerator and denominator; although these would be handled as + # rational inequalities, these test confirm that the right thing is done + # when the domain is EX (e.g. when 2 is replaced with sqrt(2)) + assert isolve(1/(x - 2) > 0, x) == And(S(2) < x, x < oo) + den = ((x - 1)*(x - 2)).expand() + assert isolve((x - 1)/den <= 0, x) == \ + (x > -oo) & (x < 2) & Ne(x, 1) + + n = Dummy('n') + raises(NotImplementedError, lambda: isolve(Abs(x) <= n, x, relational=False)) + c1 = Dummy("c1", positive=True) + raises(NotImplementedError, lambda: isolve(n/c1 < 0, c1)) + n = Dummy('n', negative=True) + assert isolve(n/c1 > -2, c1) == (-n/2 < c1) + assert isolve(n/c1 < 0, c1) == True + assert isolve(n/c1 > 0, c1) == False + + zero = cos(1)**2 + sin(1)**2 - 1 + raises(NotImplementedError, lambda: isolve(x**2 < zero, x)) + raises(NotImplementedError, lambda: isolve( + x**2 < zero*I, x)) + raises(NotImplementedError, lambda: isolve(1/(x - y) < 2, x)) + raises(NotImplementedError, lambda: isolve(1/(x - y) < 0, x)) + raises(TypeError, lambda: isolve(x - I < 0, x)) + + zero = x**2 + x - x*(x + 1) + assert isolve(zero < 0, x, relational=False) is S.EmptySet + assert isolve(zero <= 0, x, relational=False) is S.Reals + + # make sure iter_solutions gets a default value + raises(NotImplementedError, lambda: isolve( + Eq(cos(x)**2 + sin(x)**2, 1), x)) + + +def test_trig_inequalities(): + # all the inequalities are solved in a periodic interval. + assert isolve(sin(x) < S.Half, x, relational=False) == \ + Union(Interval(0, pi/6, False, True), Interval.open(pi*Rational(5, 6), 2*pi)) + assert isolve(sin(x) > S.Half, x, relational=False) == \ + Interval(pi/6, pi*Rational(5, 6), True, True) + assert isolve(cos(x) < S.Zero, x, relational=False) == \ + Interval(pi/2, pi*Rational(3, 2), True, True) + assert isolve(cos(x) >= S.Zero, x, relational=False) == \ + Union(Interval(0, pi/2), Interval.Ropen(pi*Rational(3, 2), 2*pi)) + + assert isolve(tan(x) < S.One, x, relational=False) == \ + Union(Interval.Ropen(0, pi/4), Interval.open(pi/2, pi)) + + assert isolve(sin(x) <= S.Zero, x, relational=False) == \ + Union(FiniteSet(S.Zero), Interval.Ropen(pi, 2*pi)) + + assert isolve(sin(x) <= S.One, x, relational=False) == S.Reals + assert isolve(cos(x) < S(-2), x, relational=False) == S.EmptySet + assert isolve(sin(x) >= S.NegativeOne, x, relational=False) == S.Reals + assert isolve(cos(x) > S.One, x, relational=False) == S.EmptySet + + +def test_issue_9954(): + assert isolve(x**2 >= 0, x, relational=False) == S.Reals + assert isolve(x**2 >= 0, x, relational=True) == S.Reals.as_relational(x) + assert isolve(x**2 < 0, x, relational=False) == S.EmptySet + assert isolve(x**2 < 0, x, relational=True) == S.EmptySet.as_relational(x) + + +@XFAIL +def test_slow_general_univariate(): + r = rootof(x**5 - x**2 + 1, 0) + assert solve(sqrt(x) + 1/root(x, 3) > 1) == \ + Or(And(0 < x, x < r**6), And(r**6 < x, x < oo)) + + +def test_issue_8545(): + eq = 1 - x - abs(1 - x) + ans = And(Lt(1, x), Lt(x, oo)) + assert reduce_abs_inequality(eq, '<', x) == ans + eq = 1 - x - sqrt((1 - x)**2) + assert reduce_inequalities(eq < 0) == ans + + +def test_issue_8974(): + assert isolve(-oo < x, x) == And(-oo < x, x < oo) + assert isolve(oo > x, x) == And(-oo < x, x < oo) + + +def test_issue_10198(): + assert reduce_inequalities( + -1 + 1/abs(1/x - 1) < 0) == (x > -oo) & (x < S(1)/2) & Ne(x, 0) + + assert reduce_inequalities(abs(1/sqrt(x)) - 1, x) == Eq(x, 1) + assert reduce_abs_inequality(-3 + 1/abs(1 - 1/x), '<', x) == \ + Or(And(-oo < x, x < 0), + And(S.Zero < x, x < Rational(3, 4)), And(Rational(3, 2) < x, x < oo)) + raises(ValueError,lambda: reduce_abs_inequality(-3 + 1/abs( + 1 - 1/sqrt(x)), '<', x)) + + +def test_issue_10047(): + # issue 10047: this must remain an inequality, not True, since if x + # is not real the inequality is invalid + # assert solve(sin(x) < 2) == (x <= oo) + + # with PR 16956, (x <= oo) autoevaluates when x is extended_real + # which is assumed in the current implementation of inequality solvers + assert solve(sin(x) < 2) == True + assert solveset(sin(x) < 2, domain=S.Reals) == S.Reals + + +def test_issue_10268(): + assert solve(log(x) < 1000) == And(S.Zero < x, x < exp(1000)) + + +@XFAIL +def test_isolve_Sets(): + n = Dummy('n') + assert isolve(Abs(x) <= n, x, relational=False) == \ + Piecewise((S.EmptySet, n < 0), (Interval(-n, n), True)) + + +def test_integer_domain_relational_isolve(): + + dom = FiniteSet(0, 3) + x = Symbol('x',zero=False) + assert isolve((x - 1)*(x - 2)*(x - 4) < 0, x, domain=dom) == Eq(x, 3) + + x = Symbol('x') + assert isolve(x + 2 < 0, x, domain=S.Integers) == \ + (x <= -3) & (x > -oo) & Eq(Mod(x, 1), 0) + assert isolve(2 * x + 3 > 0, x, domain=S.Integers) == \ + (x >= -1) & (x < oo) & Eq(Mod(x, 1), 0) + assert isolve((x ** 2 + 3 * x - 2) < 0, x, domain=S.Integers) == \ + (x >= -3) & (x <= 0) & Eq(Mod(x, 1), 0) + assert isolve((x ** 2 + 3 * x - 2) > 0, x, domain=S.Integers) == \ + ((x >= 1) & (x < oo) & Eq(Mod(x, 1), 0)) | ( + (x <= -4) & (x > -oo) & Eq(Mod(x, 1), 0)) + + +def test_issue_10671_12466(): + assert solveset(sin(y), y, Interval(0, pi)) == FiniteSet(0, pi) + i = Interval(1, 10) + assert solveset((1/x).diff(x) < 0, x, i) == i + assert solveset((log(x - 6)/x) <= 0, x, S.Reals) == \ + Interval.Lopen(6, 7) + + +def test__solve_inequality(): + for op in (Gt, Lt, Le, Ge, Eq, Ne): + assert _solve_inequality(op(x, 1), x).lhs == x + assert _solve_inequality(op(S.One, x), x).lhs == x + # don't get tricked by symbol on right: solve it + assert _solve_inequality(Eq(2*x - 1, x), x) == Eq(x, 1) + ie = Eq(S.One, y) + assert _solve_inequality(ie, x) == ie + for fx in (x**2, exp(x), sin(x) + cos(x), x*(1 + x)): + for c in (0, 1): + e = 2*fx - c > 0 + assert _solve_inequality(e, x, linear=True) == ( + fx > c/S(2)) + assert _solve_inequality(2*x**2 + 2*x - 1 < 0, x, linear=True) == ( + x*(x + 1) < S.Half) + assert _solve_inequality(Eq(x*y, 1), x) == Eq(x*y, 1) + nz = Symbol('nz', nonzero=True) + assert _solve_inequality(Eq(x*nz, 1), x) == Eq(x, 1/nz) + assert _solve_inequality(x*nz < 1, x) == (x*nz < 1) + a = Symbol('a', positive=True) + assert _solve_inequality(a/x > 1, x) == (S.Zero < x) & (x < a) + assert _solve_inequality(a/x > 1, x, linear=True) == (1/x > 1/a) + # make sure to include conditions under which solution is valid + e = Eq(1 - x, x*(1/x - 1)) + assert _solve_inequality(e, x) == Ne(x, 0) + assert _solve_inequality(x < x*(1/x - 1), x) == (x < S.Half) & Ne(x, 0) + + +def test__pt(): + from sympy.solvers.inequalities import _pt + assert _pt(-oo, oo) == 0 + assert _pt(S.One, S(3)) == 2 + assert _pt(S.One, oo) == _pt(oo, S.One) == 2 + assert _pt(S.One, -oo) == _pt(-oo, S.One) == S.Half + assert _pt(S.NegativeOne, oo) == _pt(oo, S.NegativeOne) == Rational(-1, 2) + assert _pt(S.NegativeOne, -oo) == _pt(-oo, S.NegativeOne) == -2 + assert _pt(x, oo) == _pt(oo, x) == x + 1 + assert _pt(x, -oo) == _pt(-oo, x) == x - 1 + raises(ValueError, lambda: _pt(Dummy('i', infinite=True), S.One)) + + +def test_issue_25697(): + assert _solve_inequality(log(x, 3) <= 2, x) == (x <= 9) & (S.Zero < x) + + +def test_issue_25738(): + assert reduce_inequalities(3 < abs(x) + ) == reduce_inequalities(pi < abs(x)).subs(pi, 3) + + +def test_issue_25983(): + assert(reduce_inequalities(pi/Abs(x) <= 1) == ((pi <= x) & (x < oo)) | ((-oo < x) & (x <= -pi))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_numeric.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_numeric.py new file mode 100644 index 0000000000000000000000000000000000000000..12abd38c80f07279ed41aefc7952762da0f9f430 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_numeric.py @@ -0,0 +1,139 @@ +from sympy.core.function import nfloat +from sympy.core.numbers import (Float, I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin +from sympy.integrals.integrals import Integral +from sympy.matrices.dense import Matrix +from mpmath import mnorm, mpf +from sympy.solvers import nsolve +from sympy.utilities.lambdify import lambdify +from sympy.testing.pytest import raises, XFAIL +from sympy.utilities.decorator import conserve_mpmath_dps + +@XFAIL +def test_nsolve_fail(): + x = symbols('x') + # Sometimes it is better to use the numerator (issue 4829) + # but sometimes it is not (issue 11768) so leave this to + # the discretion of the user + ans = nsolve(x**2/(1 - x)/(1 - 2*x)**2 - 100, x, 0) + assert ans > 0.46 and ans < 0.47 + + +def test_nsolve_denominator(): + x = symbols('x') + # Test that nsolve uses the full expression (numerator and denominator). + ans = nsolve((x**2 + 3*x + 2)/(x + 2), -2.1) + # The root -2 was divided out, so make sure we don't find it. + assert ans == -1.0 + +def test_nsolve(): + # onedimensional + x = Symbol('x') + assert nsolve(sin(x), 2) - pi.evalf() < 1e-15 + assert nsolve(Eq(2*x, 2), x, -10) == nsolve(2*x - 2, -10) + # Testing checks on number of inputs + raises(TypeError, lambda: nsolve(Eq(2*x, 2))) + raises(TypeError, lambda: nsolve(Eq(2*x, 2), x, 1, 2)) + # multidimensional + x1 = Symbol('x1') + x2 = Symbol('x2') + f1 = 3 * x1**2 - 2 * x2**2 - 1 + f2 = x1**2 - 2 * x1 + x2**2 + 2 * x2 - 8 + f = Matrix((f1, f2)).T + F = lambdify((x1, x2), f.T, modules='mpmath') + for x0 in [(-1, 1), (1, -2), (4, 4), (-4, -4)]: + x = nsolve(f, (x1, x2), x0, tol=1.e-8) + assert mnorm(F(*x), 1) <= 1.e-10 + # The Chinese mathematician Zhu Shijie was the very first to solve this + # nonlinear system 700 years ago (z was added to make it 3-dimensional) + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + f1 = -x + 2*y + f2 = (x**2 + x*(y**2 - 2) - 4*y) / (x + 4) + f3 = sqrt(x**2 + y**2)*z + f = Matrix((f1, f2, f3)).T + F = lambdify((x, y, z), f.T, modules='mpmath') + + def getroot(x0): + root = nsolve(f, (x, y, z), x0) + assert mnorm(F(*root), 1) <= 1.e-8 + return root + assert list(map(round, getroot((1, 1, 1)))) == [2, 1, 0] + assert nsolve([Eq( + f1, 0), Eq(f2, 0), Eq(f3, 0)], [x, y, z], (1, 1, 1)) # just see that it works + a = Symbol('a') + assert abs(nsolve(1/(0.001 + a)**3 - 6/(0.9 - a)**3, a, 0.3) - + mpf('0.31883011387318591')) < 1e-15 + + +def test_issue_6408(): + x = Symbol('x') + assert nsolve(Piecewise((x, x < 1), (x**2, True)), x, 2) == 0 + + +def test_issue_6408_integral(): + x, y = symbols('x y') + assert nsolve(Integral(x*y, (x, 0, 5)), y, 2) == 0 + + +@conserve_mpmath_dps +def test_increased_dps(): + # Issue 8564 + import mpmath + mpmath.mp.dps = 128 + x = Symbol('x') + e1 = x**2 - pi + q = nsolve(e1, x, 3.0) + + assert abs(sqrt(pi).evalf(128) - q) < 1e-128 + +def test_nsolve_precision(): + x, y = symbols('x y') + sol = nsolve(x**2 - pi, x, 3, prec=128) + assert abs(sqrt(pi).evalf(128) - sol) < 1e-128 + assert isinstance(sol, Float) + + sols = nsolve((y**2 - x, x**2 - pi), (x, y), (3, 3), prec=128) + assert isinstance(sols, Matrix) + assert sols.shape == (2, 1) + assert abs(sqrt(pi).evalf(128) - sols[0]) < 1e-128 + assert abs(sqrt(sqrt(pi)).evalf(128) - sols[1]) < 1e-128 + assert all(isinstance(i, Float) for i in sols) + +def test_nsolve_complex(): + x, y = symbols('x y') + + assert nsolve(x**2 + 2, 1j) == sqrt(2.)*I + assert nsolve(x**2 + 2, I) == sqrt(2.)*I + + assert nsolve([x**2 + 2, y**2 + 2], [x, y], [I, I]) == Matrix([sqrt(2.)*I, sqrt(2.)*I]) + assert nsolve([x**2 + 2, y**2 + 2], [x, y], [I, I]) == Matrix([sqrt(2.)*I, sqrt(2.)*I]) + +def test_nsolve_dict_kwarg(): + x, y = symbols('x y') + # one variable + assert nsolve(x**2 - 2, 1, dict = True) == \ + [{x: sqrt(2.)}] + # one variable with complex solution + assert nsolve(x**2 + 2, I, dict = True) == \ + [{x: sqrt(2.)*I}] + # two variables + assert nsolve([x**2 + y**2 - 5, x**2 - y**2 + 1], [x, y], [1, 1], dict = True) == \ + [{x: sqrt(2.), y: sqrt(3.)}] + +def test_nsolve_rational(): + x = symbols('x') + assert nsolve(x - Rational(1, 3), 0, prec=100) == Rational(1, 3).evalf(100) + + +def test_issue_14950(): + x = Matrix(symbols('t s')) + x0 = Matrix([17, 23]) + eqn = x + x0 + assert nsolve(eqn, x, x0) == nfloat(-x0) + assert nsolve(eqn.T, x.T, x0.T) == nfloat(-x0) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_pde.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_pde.py new file mode 100644 index 0000000000000000000000000000000000000000..948d90c7be21a9e0e03753e723ef04f1fb08a5d6 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_pde.py @@ -0,0 +1,239 @@ +from sympy.core.function import (Derivative as D, Function) +from sympy.core.relational import Eq +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.core import S +from sympy.solvers.pde import (pde_separate, pde_separate_add, pde_separate_mul, + pdsolve, classify_pde, checkpdesol) +from sympy.testing.pytest import raises + + +a, b, c, x, y = symbols('a b c x y') + +def test_pde_separate_add(): + x, y, z, t = symbols("x,y,z,t") + F, T, X, Y, Z, u = map(Function, 'FTXYZu') + + eq = Eq(D(u(x, t), x), D(u(x, t), t)*exp(u(x, t))) + res = pde_separate_add(eq, u(x, t), [X(x), T(t)]) + assert res == [D(X(x), x)*exp(-X(x)), D(T(t), t)*exp(T(t))] + + +def test_pde_separate(): + x, y, z, t = symbols("x,y,z,t") + F, T, X, Y, Z, u = map(Function, 'FTXYZu') + + eq = Eq(D(u(x, t), x), D(u(x, t), t)*exp(u(x, t))) + raises(ValueError, lambda: pde_separate(eq, u(x, t), [X(x), T(t)], 'div')) + + +def test_pde_separate_mul(): + x, y, z, t = symbols("x,y,z,t") + c = Symbol("C", real=True) + Phi = Function('Phi') + F, R, T, X, Y, Z, u = map(Function, 'FRTXYZu') + r, theta, z = symbols('r,theta,z') + + # Something simple :) + eq = Eq(D(F(x, y, z), x) + D(F(x, y, z), y) + D(F(x, y, z), z), 0) + + # Duplicate arguments in functions + raises( + ValueError, lambda: pde_separate_mul(eq, F(x, y, z), [X(x), u(z, z)])) + # Wrong number of arguments + raises(ValueError, lambda: pde_separate_mul(eq, F(x, y, z), [X(x), Y(y)])) + # Wrong variables: [x, y] -> [x, z] + raises( + ValueError, lambda: pde_separate_mul(eq, F(x, y, z), [X(t), Y(x, y)])) + + assert pde_separate_mul(eq, F(x, y, z), [Y(y), u(x, z)]) == \ + [D(Y(y), y)/Y(y), -D(u(x, z), x)/u(x, z) - D(u(x, z), z)/u(x, z)] + assert pde_separate_mul(eq, F(x, y, z), [X(x), Y(y), Z(z)]) == \ + [D(X(x), x)/X(x), -D(Z(z), z)/Z(z) - D(Y(y), y)/Y(y)] + + # wave equation + wave = Eq(D(u(x, t), t, t), c**2*D(u(x, t), x, x)) + res = pde_separate_mul(wave, u(x, t), [X(x), T(t)]) + assert res == [D(X(x), x, x)/X(x), D(T(t), t, t)/(c**2*T(t))] + + # Laplace equation in cylindrical coords + eq = Eq(1/r * D(Phi(r, theta, z), r) + D(Phi(r, theta, z), r, 2) + + 1/r**2 * D(Phi(r, theta, z), theta, 2) + D(Phi(r, theta, z), z, 2), 0) + # Separate z + res = pde_separate_mul(eq, Phi(r, theta, z), [Z(z), u(theta, r)]) + assert res == [D(Z(z), z, z)/Z(z), + -D(u(theta, r), r, r)/u(theta, r) - + D(u(theta, r), r)/(r*u(theta, r)) - + D(u(theta, r), theta, theta)/(r**2*u(theta, r))] + # Lets use the result to create a new equation... + eq = Eq(res[1], c) + # ...and separate theta... + res = pde_separate_mul(eq, u(theta, r), [T(theta), R(r)]) + assert res == [D(T(theta), theta, theta)/T(theta), + -r*D(R(r), r)/R(r) - r**2*D(R(r), r, r)/R(r) - c*r**2] + # ...or r... + res = pde_separate_mul(eq, u(theta, r), [R(r), T(theta)]) + assert res == [r*D(R(r), r)/R(r) + r**2*D(R(r), r, r)/R(r) + c*r**2, + -D(T(theta), theta, theta)/T(theta)] + + +def test_issue_11726(): + x, t = symbols("x t") + f = symbols("f", cls=Function) + X, T = symbols("X T", cls=Function) + + u = f(x, t) + eq = u.diff(x, 2) - u.diff(t, 2) + res = pde_separate(eq, u, [T(x), X(t)]) + assert res == [D(T(x), x, x)/T(x),D(X(t), t, t)/X(t)] + + +def test_pde_classify(): + # When more number of hints are added, add tests for classifying here. + f = Function('f') + eq1 = a*f(x,y) + b*f(x,y).diff(x) + c*f(x,y).diff(y) + eq2 = 3*f(x,y) + 2*f(x,y).diff(x) + f(x,y).diff(y) + eq3 = a*f(x,y) + b*f(x,y).diff(x) + 2*f(x,y).diff(y) + eq4 = x*f(x,y) + f(x,y).diff(x) + 3*f(x,y).diff(y) + eq5 = x**2*f(x,y) + x*f(x,y).diff(x) + x*y*f(x,y).diff(y) + eq6 = y*x**2*f(x,y) + y*f(x,y).diff(x) + f(x,y).diff(y) + for eq in [eq1, eq2, eq3]: + assert classify_pde(eq) == ('1st_linear_constant_coeff_homogeneous',) + for eq in [eq4, eq5, eq6]: + assert classify_pde(eq) == ('1st_linear_variable_coeff',) + + +def test_checkpdesol(): + f, F = map(Function, ['f', 'F']) + eq1 = a*f(x,y) + b*f(x,y).diff(x) + c*f(x,y).diff(y) + eq2 = 3*f(x,y) + 2*f(x,y).diff(x) + f(x,y).diff(y) + eq3 = a*f(x,y) + b*f(x,y).diff(x) + 2*f(x,y).diff(y) + for eq in [eq1, eq2, eq3]: + assert checkpdesol(eq, pdsolve(eq))[0] + eq4 = x*f(x,y) + f(x,y).diff(x) + 3*f(x,y).diff(y) + eq5 = 2*f(x,y) + 1*f(x,y).diff(x) + 3*f(x,y).diff(y) + eq6 = f(x,y) + 1*f(x,y).diff(x) + 3*f(x,y).diff(y) + assert checkpdesol(eq4, [pdsolve(eq5), pdsolve(eq6)]) == [ + (False, (x - 2)*F(3*x - y)*exp(-x/S(5) - 3*y/S(5))), + (False, (x - 1)*F(3*x - y)*exp(-x/S(10) - 3*y/S(10)))] + for eq in [eq4, eq5, eq6]: + assert checkpdesol(eq, pdsolve(eq))[0] + sol = pdsolve(eq4) + sol4 = Eq(sol.lhs - sol.rhs, 0) + raises(NotImplementedError, lambda: + checkpdesol(eq4, sol4, solve_for_func=False)) + + +def test_solvefun(): + f, F, G, H = map(Function, ['f', 'F', 'G', 'H']) + eq1 = f(x,y) + f(x,y).diff(x) + f(x,y).diff(y) + assert pdsolve(eq1) == Eq(f(x, y), F(x - y)*exp(-x/2 - y/2)) + assert pdsolve(eq1, solvefun=G) == Eq(f(x, y), G(x - y)*exp(-x/2 - y/2)) + assert pdsolve(eq1, solvefun=H) == Eq(f(x, y), H(x - y)*exp(-x/2 - y/2)) + + +def test_pde_1st_linear_constant_coeff_homogeneous(): + f, F = map(Function, ['f', 'F']) + u = f(x, y) + eq = 2*u + u.diff(x) + u.diff(y) + assert classify_pde(eq) == ('1st_linear_constant_coeff_homogeneous',) + sol = pdsolve(eq) + assert sol == Eq(u, F(x - y)*exp(-x - y)) + assert checkpdesol(eq, sol)[0] + + eq = 4 + (3*u.diff(x)/u) + (2*u.diff(y)/u) + assert classify_pde(eq) == ('1st_linear_constant_coeff_homogeneous',) + sol = pdsolve(eq) + assert sol == Eq(u, F(2*x - 3*y)*exp(-S(12)*x/13 - S(8)*y/13)) + assert checkpdesol(eq, sol)[0] + + eq = u + (6*u.diff(x)) + (7*u.diff(y)) + assert classify_pde(eq) == ('1st_linear_constant_coeff_homogeneous',) + sol = pdsolve(eq) + assert sol == Eq(u, F(7*x - 6*y)*exp(-6*x/S(85) - 7*y/S(85))) + assert checkpdesol(eq, sol)[0] + + eq = a*u + b*u.diff(x) + c*u.diff(y) + sol = pdsolve(eq) + assert checkpdesol(eq, sol)[0] + + +def test_pde_1st_linear_constant_coeff(): + f, F = map(Function, ['f', 'F']) + u = f(x,y) + eq = -2*u.diff(x) + 4*u.diff(y) + 5*u - exp(x + 3*y) + sol = pdsolve(eq) + assert sol == Eq(f(x,y), + (F(4*x + 2*y)*exp(x/2) + exp(x + 4*y)/15)*exp(-y)) + assert classify_pde(eq) == ('1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral') + assert checkpdesol(eq, sol)[0] + + eq = (u.diff(x)/u) + (u.diff(y)/u) + 1 - (exp(x + y)/u) + sol = pdsolve(eq) + assert sol == Eq(f(x, y), F(x - y)*exp(-x/2 - y/2) + exp(x + y)/3) + assert classify_pde(eq) == ('1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral') + assert checkpdesol(eq, sol)[0] + + eq = 2*u + -u.diff(x) + 3*u.diff(y) + sin(x) + sol = pdsolve(eq) + assert sol == Eq(f(x, y), + F(3*x + y)*exp(x/5 - 3*y/5) - 2*sin(x)/5 - cos(x)/5) + assert classify_pde(eq) == ('1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral') + assert checkpdesol(eq, sol)[0] + + eq = u + u.diff(x) + u.diff(y) + x*y + sol = pdsolve(eq) + assert sol.expand() == Eq(f(x, y), + x + y + (x - y)**2/4 - (x + y)**2/4 + F(x - y)*exp(-x/2 - y/2) - 2).expand() + assert classify_pde(eq) == ('1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral') + assert checkpdesol(eq, sol)[0] + eq = u + u.diff(x) + u.diff(y) + log(x) + assert classify_pde(eq) == ('1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral') + + +def test_pdsolve_all(): + f, F = map(Function, ['f', 'F']) + u = f(x,y) + eq = u + u.diff(x) + u.diff(y) + x**2*y + sol = pdsolve(eq, hint = 'all') + keys = ['1st_linear_constant_coeff', + '1st_linear_constant_coeff_Integral', 'default', 'order'] + assert sorted(sol.keys()) == keys + assert sol['order'] == 1 + assert sol['default'] == '1st_linear_constant_coeff' + assert sol['1st_linear_constant_coeff'].expand() == Eq(f(x, y), + -x**2*y + x**2 + 2*x*y - 4*x - 2*y + F(x - y)*exp(-x/2 - y/2) + 6).expand() + + +def test_pdsolve_variable_coeff(): + f, F = map(Function, ['f', 'F']) + u = f(x, y) + eq = x*(u.diff(x)) - y*(u.diff(y)) + y**2*u - y**2 + sol = pdsolve(eq, hint="1st_linear_variable_coeff") + assert sol == Eq(u, F(x*y)*exp(y**2/2) + 1) + assert checkpdesol(eq, sol)[0] + + eq = x**2*u + x*u.diff(x) + x*y*u.diff(y) + sol = pdsolve(eq, hint='1st_linear_variable_coeff') + assert sol == Eq(u, F(y*exp(-x))*exp(-x**2/2)) + assert checkpdesol(eq, sol)[0] + + eq = y*x**2*u + y*u.diff(x) + u.diff(y) + sol = pdsolve(eq, hint='1st_linear_variable_coeff') + assert sol == Eq(u, F(-2*x + y**2)*exp(-x**3/3)) + assert checkpdesol(eq, sol)[0] + + eq = exp(x)**2*(u.diff(x)) + y + sol = pdsolve(eq, hint='1st_linear_variable_coeff') + assert sol == Eq(u, y*exp(-2*x)/2 + F(y)) + assert checkpdesol(eq, sol)[0] + + eq = exp(2*x)*(u.diff(y)) + y*u - u + sol = pdsolve(eq, hint='1st_linear_variable_coeff') + assert sol == Eq(u, F(x)*exp(-y*(y - 2)*exp(-2*x)/2)) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_polysys.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_polysys.py new file mode 100644 index 0000000000000000000000000000000000000000..a119591a0354ba377a18767eae6e8b7812810a0d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_polysys.py @@ -0,0 +1,462 @@ +"""Tests for solvers of systems of polynomial equations. """ +from sympy.polys.domains import ZZ, QQ_I +from sympy.core.numbers import (I, Integer, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys.domains.rationalfield import QQ +from sympy.polys.polyerrors import UnsolvableFactorError +from sympy.polys.polyoptions import Options +from sympy.polys.polytools import Poly +from sympy.polys.rootoftools import CRootOf +from sympy.solvers.solvers import solve +from sympy.utilities.iterables import flatten +from sympy.abc import a, b, c, x, y, z +from sympy.polys import PolynomialError +from sympy.solvers.polysys import (solve_poly_system, + solve_triangulated, + solve_biquadratic, SolveFailed, + solve_generic, factor_system_bool, + factor_system_cond, factor_system_poly, + factor_system, _factor_sets, _factor_sets_slow) +from sympy.polys.polytools import parallel_poly_from_expr +from sympy.testing.pytest import raises +from sympy.core.relational import Eq +from sympy.functions.elementary.trigonometric import sin, cos + +from sympy.functions.elementary.exponential import exp + + +def test_solve_poly_system(): + assert solve_poly_system([x - 1], x) == [(S.One,)] + + assert solve_poly_system([y - x, y - x - 1], x, y) is None + + assert solve_poly_system([y - x**2, y + x**2], x, y) == [(S.Zero, S.Zero)] + + assert solve_poly_system([2*x - 3, y*Rational(3, 2) - 2*x, z - 5*y], x, y, z) == \ + [(Rational(3, 2), Integer(2), Integer(10))] + + assert solve_poly_system([x*y - 2*y, 2*y**2 - x**2], x, y) == \ + [(0, 0), (2, -sqrt(2)), (2, sqrt(2))] + + assert solve_poly_system([y - x**2, y + x**2 + 1], x, y) == \ + [(-I*sqrt(S.Half), Rational(-1, 2)), (I*sqrt(S.Half), Rational(-1, 2))] + + f_1 = x**2 + y + z - 1 + f_2 = x + y**2 + z - 1 + f_3 = x + y + z**2 - 1 + + a, b = sqrt(2) - 1, -sqrt(2) - 1 + + assert solve_poly_system([f_1, f_2, f_3], x, y, z) == \ + [(0, 0, 1), (0, 1, 0), (1, 0, 0), (a, a, a), (b, b, b)] + + solution = [(1, -1), (1, 1)] + + assert solve_poly_system([Poly(x**2 - y**2), Poly(x - 1)]) == solution + assert solve_poly_system([x**2 - y**2, x - 1], x, y) == solution + assert solve_poly_system([x**2 - y**2, x - 1]) == solution + + assert solve_poly_system( + [x + x*y - 3, y + x*y - 4], x, y) == [(-3, -2), (1, 2)] + + raises(NotImplementedError, lambda: solve_poly_system([x**3 - y**3], x, y)) + raises(NotImplementedError, lambda: solve_poly_system( + [z, -2*x*y**2 + x + y**2*z, y**2*(-z - 4) + 2])) + raises(PolynomialError, lambda: solve_poly_system([1/x], x)) + + raises(NotImplementedError, lambda: solve_poly_system( + [x-1,], (x, y))) + raises(NotImplementedError, lambda: solve_poly_system( + [y-1,], (x, y))) + + # solve_poly_system should ideally construct solutions using + # CRootOf for the following four tests + assert solve_poly_system([x**5 - x + 1], [x], strict=False) == [] + raises(UnsolvableFactorError, lambda: solve_poly_system( + [x**5 - x + 1], [x], strict=True)) + + assert solve_poly_system([(x - 1)*(x**5 - x + 1), y**2 - 1], [x, y], + strict=False) == [(1, -1), (1, 1)] + raises(UnsolvableFactorError, + lambda: solve_poly_system([(x - 1)*(x**5 - x + 1), y**2-1], + [x, y], strict=True)) + + +def test_solve_generic(): + NewOption = Options((x, y), {'domain': 'ZZ'}) + assert solve_generic([x**2 - 2*y**2, y**2 - y + 1], NewOption) == \ + [(-sqrt(-1 - sqrt(3)*I), Rational(1, 2) - sqrt(3)*I/2), + (sqrt(-1 - sqrt(3)*I), Rational(1, 2) - sqrt(3)*I/2), + (-sqrt(-1 + sqrt(3)*I), Rational(1, 2) + sqrt(3)*I/2), + (sqrt(-1 + sqrt(3)*I), Rational(1, 2) + sqrt(3)*I/2)] + + # solve_generic should ideally construct solutions using + # CRootOf for the following two tests + assert solve_generic( + [2*x - y, (y - 1)*(y**5 - y + 1)], NewOption, strict=False) == \ + [(Rational(1, 2), 1)] + raises(UnsolvableFactorError, lambda: solve_generic( + [2*x - y, (y - 1)*(y**5 - y + 1)], NewOption, strict=True)) + + +def test_solve_biquadratic(): + x0, y0, x1, y1, r = symbols('x0 y0 x1 y1 r') + + f_1 = (x - 1)**2 + (y - 1)**2 - r**2 + f_2 = (x - 2)**2 + (y - 2)**2 - r**2 + s = sqrt(2*r**2 - 1) + a = (3 - s)/2 + b = (3 + s)/2 + assert solve_poly_system([f_1, f_2], x, y) == [(a, b), (b, a)] + + f_1 = (x - 1)**2 + (y - 2)**2 - r**2 + f_2 = (x - 1)**2 + (y - 1)**2 - r**2 + + assert solve_poly_system([f_1, f_2], x, y) == \ + [(1 - sqrt((2*r - 1)*(2*r + 1))/2, Rational(3, 2)), + (1 + sqrt((2*r - 1)*(2*r + 1))/2, Rational(3, 2))] + + query = lambda expr: expr.is_Pow and expr.exp is S.Half + + f_1 = (x - 1 )**2 + (y - 2)**2 - r**2 + f_2 = (x - x1)**2 + (y - 1)**2 - r**2 + + result = solve_poly_system([f_1, f_2], x, y) + + assert len(result) == 2 and all(len(r) == 2 for r in result) + assert all(r.count(query) == 1 for r in flatten(result)) + + f_1 = (x - x0)**2 + (y - y0)**2 - r**2 + f_2 = (x - x1)**2 + (y - y1)**2 - r**2 + + result = solve_poly_system([f_1, f_2], x, y) + + assert len(result) == 2 and all(len(r) == 2 for r in result) + assert all(len(r.find(query)) == 1 for r in flatten(result)) + + s1 = (x*y - y, x**2 - x) + assert solve(s1) == [{x: 1}, {x: 0, y: 0}] + s2 = (x*y - x, y**2 - y) + assert solve(s2) == [{y: 1}, {x: 0, y: 0}] + gens = (x, y) + for seq in (s1, s2): + (f, g), opt = parallel_poly_from_expr(seq, *gens) + raises(SolveFailed, lambda: solve_biquadratic(f, g, opt)) + seq = (x**2 + y**2 - 2, y**2 - 1) + (f, g), opt = parallel_poly_from_expr(seq, *gens) + assert solve_biquadratic(f, g, opt) == [ + (-1, -1), (-1, 1), (1, -1), (1, 1)] + ans = [(0, -1), (0, 1)] + seq = (x**2 + y**2 - 1, y**2 - 1) + (f, g), opt = parallel_poly_from_expr(seq, *gens) + assert solve_biquadratic(f, g, opt) == ans + seq = (x**2 + y**2 - 1, x**2 - x + y**2 - 1) + (f, g), opt = parallel_poly_from_expr(seq, *gens) + assert solve_biquadratic(f, g, opt) == ans + + +def test_solve_triangulated(): + f_1 = x**2 + y + z - 1 + f_2 = x + y**2 + z - 1 + f_3 = x + y + z**2 - 1 + + a, b = sqrt(2) - 1, -sqrt(2) - 1 + + assert solve_triangulated([f_1, f_2, f_3], x, y, z) == \ + [(0, 0, 1), (0, 1, 0), (1, 0, 0)] + + dom = QQ.algebraic_field(sqrt(2)) + + assert solve_triangulated([f_1, f_2, f_3], x, y, z, domain=dom) == \ + [(0, 0, 1), (0, 1, 0), (1, 0, 0), (a, a, a), (b, b, b)] + + a, b = CRootOf(z**2 + 2*z - 1, 0), CRootOf(z**2 + 2*z - 1, 1) + assert solve_triangulated([f_1, f_2, f_3], x, y, z, extension=True) == \ + [(0, 0, 1), (0, 1, 0), (1, 0, 0), (a, a, a), (b, b, b)] + + +def test_solve_issue_3686(): + roots = solve_poly_system([((x - 5)**2/250000 + (y - Rational(5, 10))**2/250000) - 1, x], x, y) + assert roots == [(0, S.Half - 15*sqrt(1111)), (0, S.Half + 15*sqrt(1111))] + + roots = solve_poly_system([((x - 5)**2/250000 + (y - 5.0/10)**2/250000) - 1, x], x, y) + # TODO: does this really have to be so complicated?! + assert len(roots) == 2 + assert roots[0][0] == 0 + assert roots[0][1].epsilon_eq(-499.474999374969, 1e12) + assert roots[1][0] == 0 + assert roots[1][1].epsilon_eq(500.474999374969, 1e12) + + +def test_factor_system(): + + assert factor_system([x**2 + 2*x + 1]) == [[x + 1]] + assert factor_system([x**2 + 2*x + 1, y**2 + 2*y + 1]) == [[x + 1, y + 1]] + assert factor_system([x**2 + 1]) == [[x**2 + 1]] + assert factor_system([]) == [[]] + + assert factor_system([x**2 + y**2 + 2*x*y, x**2 - 2], extension=sqrt(2)) == [ + [x + y, x + sqrt(2)], + [x + y, x - sqrt(2)], + ] + + assert factor_system([x**2 + 1, y**2 + 1], gaussian=True) == [ + [x + I, y + I], + [x + I, y - I], + [x - I, y + I], + [x - I, y - I], + ] + + assert factor_system([x**2 + 1, y**2 + 1], domain=QQ_I) == [ + [x + I, y + I], + [x + I, y - I], + [x - I, y + I], + [x - I, y - I], + ] + + assert factor_system([0]) == [[]] + assert factor_system([1]) == [] + assert factor_system([0 , x]) == [[x]] + assert factor_system([1, 0, x]) == [] + + assert factor_system([x**4 - 1, y**6 - 1]) == [ + [x**2 + 1, y**2 + y + 1], + [x**2 + 1, y**2 - y + 1], + [x**2 + 1, y + 1], + [x**2 + 1, y - 1], + [x + 1, y**2 + y + 1], + [x + 1, y**2 - y + 1], + [x - 1, y**2 + y + 1], + [x - 1, y**2 - y + 1], + [x + 1, y + 1], + [x + 1, y - 1], + [x - 1, y + 1], + [x - 1, y - 1], + ] + + assert factor_system([(x - 1)*(y - 2), (y - 2)*(z - 3)]) == [ + [x - 1, z - 3], + [y - 2] + ] + + assert factor_system([sin(x)**2 + cos(x)**2 - 1, x]) == [ + [x, sin(x)**2 + cos(x)**2 - 1], + ] + + assert factor_system([sin(x)**2 + cos(x)**2 - 1]) == [ + [sin(x)**2 + cos(x)**2 - 1] + ] + + assert factor_system([sin(x)**2 + cos(x)**2]) == [ + [sin(x)**2 + cos(x)**2] + ] + + assert factor_system([a*x, y, a]) == [[y, a]] + + assert factor_system([a*x, y, a], [x, y]) == [] + + assert factor_system([a ** 2 * x, y], [x, y]) == [[x, y]] + + assert factor_system([a*x*(x - 1), b*y, c], [x, y]) == [] + + assert factor_system([a*x*(x - 1), b*y, c], [x, y, c]) == [ + [x - 1, y, c], + [x, y, c], + ] + + assert factor_system([a*x*(x - 1), b*y, c]) == [ + [x - 1, y, c], + [x, y, c], + [x - 1, b, c], + [x, b, c], + [y, a, c], + [a, b, c], + ] + + assert factor_system([x**2 - 2], [y]) == [] + + assert factor_system([x**2 - 2], [x]) == [[x**2 - 2]] + + assert factor_system([cos(x)**2 - sin(x)**2, cos(x)**2 + sin(x)**2 - 1]) == [ + [sin(x)**2 + cos(x)**2 - 1, sin(x) + cos(x)], + [sin(x)**2 + cos(x)**2 - 1, -sin(x) + cos(x)], + ] + + assert factor_system([(cos(x) + sin(x))**2 - 1, cos(x)**2 - sin(x)**2 - cos(2*x)]) == [ + [sin(x)**2 - cos(x)**2 + cos(2*x), sin(x) + cos(x) + 1], + [sin(x)**2 - cos(x)**2 + cos(2*x), sin(x) + cos(x) - 1], + ] + + assert factor_system([(cos(x) + sin(x))*exp(y) - 1, (cos(x) - sin(x))*exp(y) - 1]) == [ + [exp(y)*sin(x) + exp(y)*cos(x) - 1, -exp(y)*sin(x) + exp(y)*cos(x) - 1] + ] + + +def test_factor_system_poly(): + + px = lambda e: Poly(e, x) + pxab = lambda e: Poly(e, x, domain=ZZ[a, b]) + pxI = lambda e: Poly(e, x, domain=QQ_I) + pxyz = lambda e: Poly(e, (x, y, z)) + + assert factor_system_poly([px(x**2 - 1), px(x**2 - 4)]) == [ + [px(x + 2), px(x + 1)], + [px(x + 2), px(x - 1)], + [px(x + 1), px(x - 2)], + [px(x - 1), px(x - 2)], + ] + + assert factor_system_poly([px(x**2 - 1)]) == [[px(x + 1)], [px(x - 1)]] + + assert factor_system_poly([pxyz(x**2*y - y), pxyz(x**2*z - z)]) == [ + [pxyz(x + 1)], + [pxyz(x - 1)], + [pxyz(y), pxyz(z)], + ] + + assert factor_system_poly([px(x**2*(x - 1)**2), px(x*(x - 1))]) == [ + [px(x)], + [px(x - 1)], + ] + + assert factor_system_poly([pxyz(x**2 + y*x), pxyz(x**2 + z*x)]) == [ + [pxyz(x + y), pxyz(x + z)], + [pxyz(x)], + ] + + assert factor_system_poly([pxab((a - 1)*(x - 2)), pxab((b - 3)*(x - 2))]) == [ + [pxab(x - 2)], + [pxab(a - 1), pxab(b - 3)], + ] + + assert factor_system_poly([pxI(x**2 + 1)]) == [[pxI(x + I)], [pxI(x - I)]] + + assert factor_system_poly([]) == [[]] + + assert factor_system_poly([px(1)]) == [] + assert factor_system_poly([px(0), px(x)]) == [[px(x)]] + + +def test_factor_system_cond(): + + assert factor_system_cond([x ** 2 - 1, x ** 2 - 4]) == [ + [x + 2, x + 1], + [x + 2, x - 1], + [x + 1, x - 2], + [x - 1, x - 2], + ] + + assert factor_system_cond([1]) == [] + assert factor_system_cond([0]) == [[]] + assert factor_system_cond([1, x]) == [] + assert factor_system_cond([0, x]) == [[x]] + assert factor_system_cond([]) == [[]] + + assert factor_system_cond([x**2 + y*x]) == [[x + y], [x]] + + assert factor_system_cond([(a - 1)*(x - 2), (b - 3)*(x - 2)], [x]) == [ + [x - 2], + [a - 1, b - 3], + ] + + assert factor_system_cond([a * (x - 1), b], [x]) == [[x - 1, b], [a, b]] + + assert factor_system_cond([a*x*(x-1), b*y, c], [x, y]) == [ + [x - 1, y, c], + [x, y, c], + [x - 1, b, c], + [x, b, c], + [y, a, c], + [a, b, c], + ] + + assert factor_system_cond([x*(x-1), y], [x, y]) == [[x - 1, y], [x, y]] + + assert factor_system_cond([a*x, y, a], [x, y]) == [[y, a]] + + assert factor_system_cond([a*x, b*x], [x, y]) == [[x], [a, b]] + + assert factor_system_cond([a*b*x, y], [x, y]) == [[x, y], [y, a*b]] + + assert factor_system_cond([a*b*x, y]) == [[x, y], [y, a], [y, b]] + + assert factor_system_cond([a**2*x, y], [x, y]) == [[x, y], [y, a]] + +def test_factor_system_bool(): + + eqs = [a*(x - 1)*(y - 1), b*(x - 2)*(y - 1)*(y - 2)] + assert factor_system_bool(eqs, [x, y]) == ( + Eq(y - 1, 0) + | (Eq(a, 0) & Eq(b, 0)) + | (Eq(a, 0) & Eq(x - 2, 0)) + | (Eq(a, 0) & Eq(y - 2, 0)) + | (Eq(b, 0) & Eq(x - 1, 0)) + | (Eq(x - 2, 0) & Eq(x - 1, 0)) + | (Eq(x - 1, 0) & Eq(y - 2, 0)) + ) + + assert factor_system_bool([x - 1], [x]) == Eq(x - 1, 0) + + assert factor_system_bool([(x - 1)*(x - 2)], [x]) == Eq(x - 2, 0) | Eq(x - 1, 0) + + assert factor_system_bool([], [x]) == True + assert factor_system_bool([0], [x]) == True + assert factor_system_bool([1], [x]) == False + assert factor_system_bool([a], [x]) == Eq(a, 0) + + assert factor_system_bool([a * x, y, a], [x, y]) == Eq(a, 0) & Eq(y, 0) + + assert (factor_system_bool([a*x, b*y*x, a], [x, y]) == ( + Eq(a, 0) & Eq(b, 0)) + | (Eq(a, 0) & Eq(x, 0)) + | (Eq(a, 0) & Eq(y, 0))) + + assert (factor_system_bool([a*x, b*x], [x, y]) == Eq(x, 0) | + (Eq(a, 0) & Eq(b, 0))) + + assert (factor_system_bool([a*b*x, y], [x, y]) == ( + Eq(x, 0) & Eq(y, 0)) | + (Eq(y, 0) & Eq(a*b, 0))) + + assert (factor_system_bool([a**2*x, y], [x, y]) == ( + Eq(a, 0) & Eq(y, 0)) | + (Eq(x, 0) & Eq(y, 0))) + + assert factor_system_bool([a*x*y, b*y*z], [x, y, z]) == ( + Eq(y, 0) + | (Eq(a, 0) & Eq(b, 0)) + | (Eq(a, 0) & Eq(z, 0)) + | (Eq(b, 0) & Eq(x, 0)) + | (Eq(x, 0) & Eq(z, 0)) + ) + + assert factor_system_bool([a*(x - 1), b], [x]) == ( + (Eq(a, 0) & Eq(b, 0)) + | (Eq(x - 1, 0) & Eq(b, 0)) + ) + + +def test_factor_sets(): + # + from random import randint + + def generate_random_system(n_eqs=3, n_factors=2, max_val=10): + return [ + [randint(0, max_val) for _ in range(randint(1, n_factors))] + for _ in range(n_eqs) + ] + + test_cases = [ + [[1, 2], [1, 3]], + [[1, 2], [3, 4]], + [[1], [1, 2], [2]], + ] + + for case in test_cases: + assert _factor_sets(case) == _factor_sets_slow(case) + + for _ in range(100): + system = generate_random_system() + assert _factor_sets(system) == _factor_sets_slow(system) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_recurr.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_recurr.py new file mode 100644 index 0000000000000000000000000000000000000000..5a6306b51a5cf33ccd9fae131430a24690d540a7 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_recurr.py @@ -0,0 +1,295 @@ +from sympy.core.function import (Function, Lambda, expand) +from sympy.core.numbers import (I, Rational) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.combinatorial.factorials import (rf, binomial, factorial) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.polys.polytools import factor +from sympy.solvers.recurr import rsolve, rsolve_hyper, rsolve_poly, rsolve_ratio +from sympy.testing.pytest import raises, slow, XFAIL +from sympy.abc import a, b + +y = Function('y') +n, k = symbols('n,k', integer=True) +C0, C1, C2 = symbols('C0,C1,C2') + + +def test_rsolve_poly(): + assert rsolve_poly([-1, -1, 1], 0, n) == 0 + assert rsolve_poly([-1, -1, 1], 1, n) == -1 + + assert rsolve_poly([-1, n + 1], n, n) == 1 + assert rsolve_poly([-1, 1], n, n) == C0 + (n**2 - n)/2 + assert rsolve_poly([-n - 1, n], 1, n) == C0*n - 1 + assert rsolve_poly([-4*n - 2, 1], 4*n + 1, n) == -1 + + assert rsolve_poly([-1, 1], n**5 + n**3, n) == \ + C0 - n**3 / 2 - n**5 / 2 + n**2 / 6 + n**6 / 6 + 2*n**4 / 3 + + +def test_rsolve_ratio(): + solution = rsolve_ratio([-2*n**3 + n**2 + 2*n - 1, 2*n**3 + n**2 - 6*n, + -2*n**3 - 11*n**2 - 18*n - 9, 2*n**3 + 13*n**2 + 22*n + 8], 0, n) + assert solution == C0*(2*n - 3)/(n**2 - 1)/2 + + +def test_rsolve_hyper(): + assert rsolve_hyper([-1, -1, 1], 0, n) in [ + C0*(S.Half - S.Half*sqrt(5))**n + C1*(S.Half + S.Half*sqrt(5))**n, + C1*(S.Half - S.Half*sqrt(5))**n + C0*(S.Half + S.Half*sqrt(5))**n, + ] + + assert rsolve_hyper([n**2 - 2, -2*n - 1, 1], 0, n) in [ + C0*rf(sqrt(2), n) + C1*rf(-sqrt(2), n), + C1*rf(sqrt(2), n) + C0*rf(-sqrt(2), n), + ] + + assert rsolve_hyper([n**2 - k, -2*n - 1, 1], 0, n) in [ + C0*rf(sqrt(k), n) + C1*rf(-sqrt(k), n), + C1*rf(sqrt(k), n) + C0*rf(-sqrt(k), n), + ] + + assert rsolve_hyper( + [2*n*(n + 1), -n**2 - 3*n + 2, n - 1], 0, n) == C1*factorial(n) + C0*2**n + + assert rsolve_hyper( + [n + 2, -(2*n + 3)*(17*n**2 + 51*n + 39), n + 1], 0, n) == 0 + + assert rsolve_hyper([-n - 1, -1, 1], 0, n) == 0 + + assert rsolve_hyper([-1, 1], n, n).expand() == C0 + n**2/2 - n/2 + + assert rsolve_hyper([-1, 1], 1 + n, n).expand() == C0 + n**2/2 + n/2 + + assert rsolve_hyper([-1, 1], 3*(n + n**2), n).expand() == C0 + n**3 - n + + assert rsolve_hyper([-a, 1],0,n).expand() == C0*a**n + + assert rsolve_hyper([-a, 0, 1], 0, n).expand() == (-1)**n*C1*a**(n/2) + C0*a**(n/2) + + assert rsolve_hyper([1, 1, 1], 0, n).expand() == \ + C0*(Rational(-1, 2) - sqrt(3)*I/2)**n + C1*(Rational(-1, 2) + sqrt(3)*I/2)**n + + assert rsolve_hyper([1, -2*n/a - 2/a, 1], 0, n) == 0 + + +@XFAIL +def test_rsolve_ratio_missed(): + # this arises during computation + # assert rsolve_hyper([-1, 1], 3*(n + n**2), n).expand() == C0 + n**3 - n + assert rsolve_ratio([-n, n + 2], n, n) is not None + + +def recurrence_term(c, f): + """Compute RHS of recurrence in f(n) with coefficients in c.""" + return sum(c[i]*f.subs(n, n + i) for i in range(len(c))) + + +def test_rsolve_bulk(): + """Some bulk-generated tests.""" + funcs = [ n, n + 1, n**2, n**3, n**4, n + n**2, 27*n + 52*n**2 - 3* + n**3 + 12*n**4 - 52*n**5 ] + coeffs = [ [-2, 1], [-2, -1, 1], [-1, 1, 1, -1, 1], [-n, 1], [n**2 - + n + 12, 1] ] + for p in funcs: + # compute difference + for c in coeffs: + q = recurrence_term(c, p) + if p.is_polynomial(n): + assert rsolve_poly(c, q, n) == p + # See issue 3956: + if p.is_hypergeometric(n) and len(c) <= 3: + assert rsolve_hyper(c, q, n).subs(zip(symbols('C:3'), [0, 0, 0])).expand() == p + + +def test_rsolve_0_sol_homogeneous(): + # fixed by cherry-pick from + # https://github.com/diofant/diofant/commit/e1d2e52125199eb3df59f12e8944f8a5f24b00a5 + assert rsolve_hyper([n**2 - n + 12, 1], n*(n**2 - n + 12) + n + 1, n) == n + + +def test_rsolve(): + f = y(n + 2) - y(n + 1) - y(n) + h = sqrt(5)*(S.Half + S.Half*sqrt(5))**n \ + - sqrt(5)*(S.Half - S.Half*sqrt(5))**n + + assert rsolve(f, y(n)) in [ + C0*(S.Half - S.Half*sqrt(5))**n + C1*(S.Half + S.Half*sqrt(5))**n, + C1*(S.Half - S.Half*sqrt(5))**n + C0*(S.Half + S.Half*sqrt(5))**n, + ] + + assert rsolve(f, y(n), [0, 5]) == h + assert rsolve(f, y(n), {0: 0, 1: 5}) == h + assert rsolve(f, y(n), {y(0): 0, y(1): 5}) == h + assert rsolve(y(n) - y(n - 1) - y(n - 2), y(n), [0, 5]) == h + assert rsolve(Eq(y(n), y(n - 1) + y(n - 2)), y(n), [0, 5]) == h + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = (n - 1)*y(n + 2) - (n**2 + 3*n - 2)*y(n + 1) + 2*n*(n + 1)*y(n) + g = C1*factorial(n) + C0*2**n + h = -3*factorial(n) + 3*2**n + + assert rsolve(f, y(n)) == g + assert rsolve(f, y(n), []) == g + assert rsolve(f, y(n), {}) == g + + assert rsolve(f, y(n), [0, 3]) == h + assert rsolve(f, y(n), {0: 0, 1: 3}) == h + assert rsolve(f, y(n), {y(0): 0, y(1): 3}) == h + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = y(n) - y(n - 1) - 2 + + assert rsolve(f, y(n), {y(0): 0}) == 2*n + assert rsolve(f, y(n), {y(0): 1}) == 2*n + 1 + assert rsolve(f, y(n), {y(0): 0, y(1): 1}) is None + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = 3*y(n - 1) - y(n) - 1 + + assert rsolve(f, y(n), {y(0): 0}) == -3**n/2 + S.Half + assert rsolve(f, y(n), {y(0): 1}) == 3**n/2 + S.Half + assert rsolve(f, y(n), {y(0): 2}) == 3*3**n/2 + S.Half + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = y(n) - 1/n*y(n - 1) + assert rsolve(f, y(n)) == C0/factorial(n) + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = y(n) - 1/n*y(n - 1) - 1 + assert rsolve(f, y(n)) is None + + f = 2*y(n - 1) + (1 - n)*y(n)/n + + assert rsolve(f, y(n), {y(1): 1}) == 2**(n - 1)*n + assert rsolve(f, y(n), {y(1): 2}) == 2**(n - 1)*n*2 + assert rsolve(f, y(n), {y(1): 3}) == 2**(n - 1)*n*3 + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + f = (n - 1)*(n - 2)*y(n + 2) - (n + 1)*(n + 2)*y(n) + + assert rsolve(f, y(n), {y(3): 6, y(4): 24}) == n*(n - 1)*(n - 2) + assert rsolve( + f, y(n), {y(3): 6, y(4): -24}) == -n*(n - 1)*(n - 2)*(-1)**(n) + + assert f.subs(y, Lambda(k, rsolve(f, y(n)).subs(n, k))).simplify() == 0 + + assert rsolve(Eq(y(n + 1), a*y(n)), y(n), {y(1): a}).simplify() == a**n + + assert rsolve(y(n) - a*y(n-2),y(n), \ + {y(1): sqrt(a)*(a + b), y(2): a*(a - b)}).simplify() == \ + a**(n/2 + 1) - b*(-sqrt(a))**n + + f = (-16*n**2 + 32*n - 12)*y(n - 1) + (4*n**2 - 12*n + 9)*y(n) + + yn = rsolve(f, y(n), {y(1): binomial(2*n + 1, 3)}) + sol = 2**(2*n)*n*(2*n - 1)**2*(2*n + 1)/12 + assert factor(expand(yn, func=True)) == sol + + sol = rsolve(y(n) + a*(y(n + 1) + y(n - 1))/2, y(n)) + assert str(sol) == 'C0*((-sqrt(1 - a**2) - 1)/a)**n + C1*((sqrt(1 - a**2) - 1)/a)**n' + + assert rsolve((k + 1)*y(k), y(k)) is None + assert (rsolve((k + 1)*y(k) + (k + 3)*y(k + 1) + (k + 5)*y(k + 2), y(k)) + is None) + + assert rsolve(y(n) + y(n + 1) + 2**n + 3**n, y(n)) == (-1)**n*C0 - 2**n/3 - 3**n/4 + + +def test_rsolve_raises(): + x = Function('x') + raises(ValueError, lambda: rsolve(y(n) - y(k + 1), y(n))) + raises(ValueError, lambda: rsolve(y(n) - y(n + 1), x(n))) + raises(ValueError, lambda: rsolve(y(n) - x(n + 1), y(n))) + raises(ValueError, lambda: rsolve(y(n) - sqrt(n)*y(n + 1), y(n))) + raises(ValueError, lambda: rsolve(y(n) - y(n + 1), y(n), {x(0): 0})) + raises(ValueError, lambda: rsolve(y(n) + y(n + 1) + 2**n + cos(n), y(n))) + + +def test_issue_6844(): + f = y(n + 2) - y(n + 1) + y(n)/4 + assert rsolve(f, y(n)) == 2**(-n + 1)*C1*n + 2**(-n)*C0 + assert rsolve(f, y(n), {y(0): 0, y(1): 1}) == 2**(1 - n)*n + + +def test_issue_18751(): + r = Symbol('r', positive=True) + theta = Symbol('theta', real=True) + f = y(n) - 2 * r * cos(theta) * y(n - 1) + r**2 * y(n - 2) + assert rsolve(f, y(n)) == \ + C0*(r*(cos(theta) - I*Abs(sin(theta))))**n + C1*(r*(cos(theta) + I*Abs(sin(theta))))**n + + +def test_constant_naming(): + #issue 8697 + assert rsolve(y(n+3) - y(n+2) - y(n+1) + y(n), y(n)) == (-1)**n*C1 + C0 + C2*n + assert rsolve(y(n+3)+3*y(n+2)+3*y(n+1)+y(n), y(n)).expand() == (-1)**n*C0 - (-1)**n*C1*n - (-1)**n*C2*n**2 + assert rsolve(y(n) - 2*y(n - 3) + 5*y(n - 2) - 4*y(n - 1),y(n),[1,3,8]) == 3*2**n - n - 2 + + #issue 19630 + assert rsolve(y(n+3) - 3*y(n+1) + 2*y(n), y(n), {y(1):0, y(2):8, y(3):-2}) == (-2)**n + 2*n + + +@slow +def test_issue_15751(): + f = y(n) + 21*y(n + 1) - 273*y(n + 2) - 1092*y(n + 3) + 1820*y(n + 4) + 1092*y(n + 5) - 273*y(n + 6) - 21*y(n + 7) + y(n + 8) + assert rsolve(f, y(n)) is not None + + +def test_issue_17990(): + f = -10*y(n) + 4*y(n + 1) + 6*y(n + 2) + 46*y(n + 3) + sol = rsolve(f, y(n)) + expected = C0*((86*18**(S(1)/3)/69 + (-12 + (-1 + sqrt(3)*I)*(290412 + + 3036*sqrt(9165))**(S(1)/3))*(1 - sqrt(3)*I)*(24201 + 253*sqrt(9165))** + (S(1)/3)/276)/((1 - sqrt(3)*I)*(24201 + 253*sqrt(9165))**(S(1)/3)) + )**n + C1*((86*18**(S(1)/3)/69 + (-12 + (-1 - sqrt(3)*I)*(290412 + 3036 + *sqrt(9165))**(S(1)/3))*(1 + sqrt(3)*I)*(24201 + 253*sqrt(9165))** + (S(1)/3)/276)/((1 + sqrt(3)*I)*(24201 + 253*sqrt(9165))**(S(1)/3)) + )**n + C2*(-43*18**(S(1)/3)/(69*(24201 + 253*sqrt(9165))**(S(1)/3)) - + S(1)/23 + (290412 + 3036*sqrt(9165))**(S(1)/3)/138)**n + assert sol == expected + e = sol.subs({C0: 1, C1: 1, C2: 1, n: 1}).evalf() + assert abs(e + 0.130434782608696) < 1e-13 + + +def test_issue_8697(): + a = Function('a') + eq = a(n + 3) - a(n + 2) - a(n + 1) + a(n) + assert rsolve(eq, a(n)) == (-1)**n*C1 + C0 + C2*n + eq2 = a(n + 3) + 3*a(n + 2) + 3*a(n + 1) + a(n) + assert (rsolve(eq2, a(n)) == + (-1)**n*C0 + (-1)**(n + 1)*C1*n + (-1)**(n + 1)*C2*n**2) + + assert rsolve(a(n) - 2*a(n - 3) + 5*a(n - 2) - 4*a(n - 1), + a(n), {a(0): 1, a(1): 3, a(2): 8}) == 3*2**n - n - 2 + + # From issue thread (but fixed by https://github.com/diofant/diofant/commit/da9789c6cd7d0c2ceeea19fbf59645987125b289): + assert rsolve(a(n) - 2*a(n - 1) - n, a(n), {a(0): 1}) == 3*2**n - n - 2 + + +def test_diofantissue_294(): + f = y(n) - y(n - 1) - 2*y(n - 2) - 2*n + assert rsolve(f, y(n)) == (-1)**n*C0 + 2**n*C1 - n - Rational(5, 2) + # issue sympy/sympy#11261 + assert rsolve(f, y(n), {y(0): -1, y(1): 1}) == (-(-1)**n/2 + 2*2**n - + n - Rational(5, 2)) + # issue sympy/sympy#7055 + assert rsolve(-2*y(n) + y(n + 1) + n - 1, y(n)) == 2**n*C0 + n + + +def test_issue_15553(): + f = Function("f") + assert rsolve(Eq(f(n), 2*f(n - 1) + n), f(n)) == 2**n*C0 - n - 2 + assert rsolve(Eq(f(n + 1), 2*f(n) + n**2 + 1), f(n)) == 2**n*C0 - n**2 - 2*n - 4 + assert rsolve(Eq(f(n + 1), 2*f(n) + n**2 + 1), f(n), {f(1): 0}) == 7*2**n/2 - n**2 - 2*n - 4 + assert rsolve(Eq(f(n), 2*f(n - 1) + 3*n**2), f(n)) == 2**n*C0 - 3*n**2 - 12*n - 18 + assert rsolve(Eq(f(n), 2*f(n - 1) + n**2), f(n)) == 2**n*C0 - n**2 - 4*n - 6 + assert rsolve(Eq(f(n), 2*f(n - 1) + n), f(n), {f(0): 1}) == 3*2**n - n - 2 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_simplex.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_simplex.py new file mode 100644 index 0000000000000000000000000000000000000000..611205f5df009a6d0de6e687501695b63bb932c9 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_simplex.py @@ -0,0 +1,254 @@ +from sympy.core.numbers import Rational +from sympy.core.relational import Eq, Ne +from sympy.core.symbol import symbols +from sympy.core.sympify import sympify +from sympy.core.singleton import S +from sympy.core.random import random, choice +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.ntheory.generate import randprime +from sympy.matrices.dense import Matrix +from sympy.solvers.solveset import linear_eq_to_matrix +from sympy.solvers.simplex import (_lp as lp, _primal_dual, + UnboundedLPError, InfeasibleLPError, lpmin, lpmax, + _m, _abcd, _simplex, linprog) + +from sympy.external.importtools import import_module + +from sympy.testing.pytest import raises + +from sympy.abc import x, y, z + + +np = import_module("numpy") +scipy = import_module("scipy") + + +def test_lp(): + r1 = y + 2*z <= 3 + r2 = -x - 3*z <= -2 + r3 = 2*x + y + 7*z <= 5 + constraints = [r1, r2, r3, x >= 0, y >= 0, z >= 0] + objective = -x - y - 5 * z + ans = optimum, argmax = lp(max, objective, constraints) + assert ans == lpmax(objective, constraints) + assert objective.subs(argmax) == optimum + for constr in constraints: + assert constr.subs(argmax) == True + + r1 = x - y + 2*z <= 3 + r2 = -x + 2*y - 3*z <= -2 + r3 = 2*x + y - 7*z <= -5 + constraints = [r1, r2, r3, x >= 0, y >= 0, z >= 0] + objective = -x - y - 5*z + ans = optimum, argmax = lp(max, objective, constraints) + assert ans == lpmax(objective, constraints) + assert objective.subs(argmax) == optimum + for constr in constraints: + assert constr.subs(argmax) == True + + r1 = x - y + 2*z <= -4 + r2 = -x + 2*y - 3*z <= 8 + r3 = 2*x + y - 7*z <= 10 + constraints = [r1, r2, r3, x >= 0, y >= 0, z >= 0] + const = 2 + objective = -x-y-5*z+const # has constant term + ans = optimum, argmax = lp(max, objective, constraints) + assert ans == lpmax(objective, constraints) + assert objective.subs(argmax) == optimum + for constr in constraints: + assert constr.subs(argmax) == True + + # Section 4 Problem 1 from + # http://web.tecnico.ulisboa.pt/mcasquilho/acad/or/ftp/FergusonUCLA_LP.pdf + # answer on page 55 + v = x1, x2, x3, x4 = symbols('x1 x2 x3 x4') + r1 = x1 - x2 - 2*x3 - x4 <= 4 + r2 = 2*x1 + x3 -4*x4 <= 2 + r3 = -2*x1 + x2 + x4 <= 1 + objective, constraints = x1 - 2*x2 - 3*x3 - x4, [r1, r2, r3] + [ + i >= 0 for i in v] + ans = optimum, argmax = lp(max, objective, constraints) + assert ans == lpmax(objective, constraints) + assert ans == (4, {x1: 7, x2: 0, x3: 0, x4: 3}) + + # input contains Floats + r1 = x - y + 2.0*z <= -4 + r2 = -x + 2*y - 3.0*z <= 8 + r3 = 2*x + y - 7*z <= 10 + constraints = [r1, r2, r3] + [i >= 0 for i in (x, y, z)] + objective = -x-y-5*z + optimum, argmax = lp(max, objective, constraints) + assert objective.subs(argmax) == optimum + for constr in constraints: + assert constr.subs(argmax) == True + + # input contains non-float or non-Rational + r1 = x - y + sqrt(2) * z <= -4 + r2 = -x + 2*y - 3*z <= 8 + r3 = 2*x + y - 7*z <= 10 + raises(TypeError, lambda: lp(max, -x-y-5*z, [r1, r2, r3])) + + r1 = x >= 0 + raises(UnboundedLPError, lambda: lp(max, x, [r1])) + r2 = x <= -1 + raises(InfeasibleLPError, lambda: lp(max, x, [r1, r2])) + + # strict inequalities are not allowed + r1 = x > 0 + raises(TypeError, lambda: lp(max, x, [r1])) + + # not equals not allowed + r1 = Ne(x, 0) + raises(TypeError, lambda: lp(max, x, [r1])) + + def make_random_problem(nvar=2, num_constraints=2, sparsity=.1): + def rand(): + if random() < sparsity: + return sympify(0) + int1, int2 = [randprime(0, 200) for _ in range(2)] + return Rational(int1, int2)*choice([-1, 1]) + variables = symbols('x1:%s' % (nvar + 1)) + constraints = [(sum(rand()*x for x in variables) <= rand()) + for _ in range(num_constraints)] + objective = sum(rand() * x for x in variables) + return objective, constraints, variables + + # equality + r1 = Eq(x, y) + r2 = Eq(y, z) + r3 = z <= 3 + constraints = [r1, r2, r3] + objective = x + ans = optimum, argmax = lp(max, objective, constraints) + assert ans == lpmax(objective, constraints) + assert objective.subs(argmax) == optimum + for constr in constraints: + assert constr.subs(argmax) == True + + +def test_simplex(): + L = [ + [[1, 1], [-1, 1], [0, 1], [-1, 0]], + [5, 1, 2, -1], + [[1, 1]], + [-1]] + A, B, C, D = _abcd(_m(*L), list=False) + assert _simplex(A, B, -C, -D) == (-6, [3, 2], [1, 0, 0, 0]) + assert _simplex(A, B, -C, -D, dual=True) == (-6, + [1, 0, 0, 0], [5, 0]) + + assert _simplex([[]],[],[[1]],[0]) == (0, [0], []) + + # handling of Eq (or Eq-like x<=y, x>=y conditions) + assert lpmax(x - y, [x <= y + 2, x >= y + 2, x >= 0, y >= 0] + ) == (2, {x: 2, y: 0}) + assert lpmax(x - y, [x <= y + 2, Eq(x, y + 2), x >= 0, y >= 0] + ) == (2, {x: 2, y: 0}) + assert lpmax(x - y, [x <= y + 2, Eq(x, 2)]) == (2, {x: 2, y: 0}) + assert lpmax(y, [Eq(y, 2)]) == (2, {y: 2}) + + # the conditions are equivalent to Eq(x, y + 2) + assert lpmin(y, [x <= y + 2, x >= y + 2, y >= 0] + ) == (0, {x: 2, y: 0}) + # equivalent to Eq(y, -2) + assert lpmax(y, [0 <= y + 2, 0 >= y + 2]) == (-2, {y: -2}) + assert lpmax(y, [0 <= y + 2, 0 >= y + 2, y <= 0] + ) == (-2, {y: -2}) + + # extra symbols symbols + assert lpmin(x, [y >= 1, x >= y]) == (1, {x: 1, y: 1}) + assert lpmin(x, [y >= 1, x >= y + z, x >= 0, z >= 0] + ) == (1, {x: 1, y: 1, z: 0}) + + # detect oscillation + # o1 + v = x1, x2, x3, x4 = symbols('x1 x2 x3 x4') + raises(InfeasibleLPError, lambda: lpmin( + 9*x2 - 8*x3 + 3*x4 + 6, + [5*x2 - 2*x3 <= 0, + -x1 - 8*x2 + 9*x3 <= -3, + 10*x1 - x2+ 9*x4 <= -4] + [i >= 0 for i in v])) + # o2 - equations fed to lpmin are changed into a matrix + # system that doesn't oscillate and has the same solution + # as below + M = linear_eq_to_matrix + f = 5*x2 + x3 + 4*x4 - x1 + L = 5*x2 + 2*x3 + 5*x4 - (x1 + 5) + cond = [L <= 0] + [Eq(3*x2 + x4, 2), Eq(-x1 + x3 + 2*x4, 1)] + c, d = M(f, v) + a, b = M(L, v) + aeq, beq = M(cond[1:], v) + ans = (S(9)/2, [0, S(1)/2, 0, S(1)/2]) + assert linprog(c, a, b, aeq, beq, bounds=(0, 1)) == ans + lpans = lpmin(f, cond + [x1 >= 0, x1 <= 1, + x2 >= 0, x2 <= 1, x3 >= 0, x3 <= 1, x4 >= 0, x4 <= 1]) + assert (lpans[0], list(lpans[1].values())) == ans + + +def test_lpmin_lpmax(): + v = x1, x2, y1, y2 = symbols('x1 x2 y1 y2') + L = [[1, -1]], [1], [[1, 1]], [2] + a, b, c, d = [Matrix(i) for i in L] + m = Matrix([[a, b], [c, d]]) + f, constr = _primal_dual(m)[0] + ans = lpmin(f, constr + [i >= 0 for i in v[:2]]) + assert ans == (-1, {x1: 1, x2: 0}),ans + + L = [[1, -1], [1, 1]], [1, 1], [[1, 1]], [2] + a, b, c, d = [Matrix(i) for i in L] + m = Matrix([[a, b], [c, d]]) + f, constr = _primal_dual(m)[1] + ans = lpmax(f, constr + [i >= 0 for i in v[-2:]]) + assert ans == (-1, {y1: 1, y2: 0}) + + +def test_linprog(): + for do in range(2): + if not do: + M = lambda a, b: linear_eq_to_matrix(a, b) + else: + # check matrices as list + M = lambda a, b: tuple([ + i.tolist() for i in linear_eq_to_matrix(a, b)]) + + v = x, y, z = symbols('x1:4') + f = x + y - 2*z + c = M(f, v)[0] + ineq = [7*x + 4*y - 7*z <= 3, + 3*x - y + 10*z <= 6, + x >= 0, y >= 0, z >= 0] + ab = M([i.lts - i.gts for i in ineq], v) + ans = (-S(6)/5, [0, 0, S(3)/5]) + assert lpmin(f, ineq) == (ans[0], dict(zip(v, ans[1]))) + assert linprog(c, *ab) == ans + + f += 1 + c = M(f, v)[0] + eq = [Eq(y - 9*x, 1)] + abeq = M([i.lhs - i.rhs for i in eq], v) + ans = (1 - S(2)/5, [0, 1, S(7)/10]) + assert lpmin(f, ineq + eq) == (ans[0], dict(zip(v, ans[1]))) + assert linprog(c, *ab, *abeq) == (ans[0] - 1, ans[1]) + + eq = [z - y <= S.Half] + abeq = M([i.lhs - i.rhs for i in eq], v) + ans = (1 - S(10)/9, [0, S(1)/9, S(11)/18]) + assert lpmin(f, ineq + eq) == (ans[0], dict(zip(v, ans[1]))) + assert linprog(c, *ab, *abeq) == (ans[0] - 1, ans[1]) + + bounds = [(0, None), (0, None), (None, S.Half)] + ans = (0, [0, 0, S.Half]) + assert lpmin(f, ineq + [z <= S.Half]) == ( + ans[0], dict(zip(v, ans[1]))) + assert linprog(c, *ab, bounds=bounds) == (ans[0] - 1, ans[1]) + assert linprog(c, *ab, bounds={v.index(z): bounds[-1]} + ) == (ans[0] - 1, ans[1]) + eq = [z - y <= S.Half] + + assert linprog([[1]], [], [], bounds=(2, 3)) == (2, [2]) + assert linprog([1], [], [], bounds=(2, 3)) == (2, [2]) + assert linprog([1], bounds=(2, 3)) == (2, [2]) + assert linprog([1, -1], [[1, 1]], [2], bounds={1:(None, None)} + ) == (-2, [0, 2]) + assert linprog([1, -1], [[1, 1]], [5], bounds={1:(3, None)} + ) == (-5, [0, 5]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solvers.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..ac9550ad404c2ec7592caf6afd2910f425138987 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solvers.py @@ -0,0 +1,2725 @@ +from sympy.assumptions.ask import (Q, ask) +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core import (GoldenRatio, TribonacciConstant) +from sympy.core.numbers import (E, Float, I, Rational, oo, pi) +from sympy.core.relational import (Eq, Gt, Lt, Ne) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, Wild, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import binomial +from sympy.functions.elementary.complexes import (Abs, arg, conjugate, im, re) +from sympy.functions.elementary.exponential import (LambertW, exp, log) +from sympy.functions.elementary.hyperbolic import (atanh, cosh, sinh, tanh) +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import (cbrt, root, sqrt) +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (acos, asin, atan, atan2, cos, sec, sin, tan) +from sympy.functions.special.error_functions import (erf, erfc, erfcinv, erfinv) +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (And, Or) +from sympy.matrices.dense import Matrix +from sympy.matrices import MatrixSymbol, SparseMatrix +from sympy.polys.polytools import Poly, groebner +from sympy.printing.str import sstr +from sympy.simplify.radsimp import denom +from sympy.solvers.solvers import (nsolve, solve, solve_linear) + +from sympy.core.function import nfloat +from sympy.solvers import solve_linear_system, solve_linear_system_LU, \ + solve_undetermined_coeffs +from sympy.solvers.bivariate import _filtered_gens, _solve_lambert, _lambert +from sympy.solvers.solvers import _invert, unrad, checksol, posify, _ispow, \ + det_quick, det_perm, det_minor, _simple_dens, denoms + +from sympy.physics.units import cm +from sympy.polys.rootoftools import CRootOf + +from sympy.testing.pytest import slow, XFAIL, SKIP, raises +from sympy.core.random import verify_numerically as tn + +from sympy.abc import a, b, c, d, e, k, h, p, x, y, z, t, q, m, R + + +def NS(e, n=15, **options): + return sstr(sympify(e).evalf(n, **options), full_prec=True) + + +def test_swap_back(): + f, g = map(Function, 'fg') + fx, gx = f(x), g(x) + assert solve([fx + y - 2, fx - gx - 5], fx, y, gx) == \ + {fx: gx + 5, y: -gx - 3} + assert solve(fx + gx*x - 2, [fx, gx], dict=True) == [{fx: 2, gx: 0}] + assert solve(fx + gx**2*x - y, [fx, gx], dict=True) == [{fx: y, gx: 0}] + assert solve([f(1) - 2, x + 2], dict=True) == [{x: -2, f(1): 2}] + + +def guess_solve_strategy(eq, symbol): + try: + solve(eq, symbol) + return True + except (TypeError, NotImplementedError): + return False + + +def test_guess_poly(): + # polynomial equations + assert guess_solve_strategy( S(4), x ) # == GS_POLY + assert guess_solve_strategy( x, x ) # == GS_POLY + assert guess_solve_strategy( x + a, x ) # == GS_POLY + assert guess_solve_strategy( 2*x, x ) # == GS_POLY + assert guess_solve_strategy( x + sqrt(2), x) # == GS_POLY + assert guess_solve_strategy( x + 2**Rational(1, 4), x) # == GS_POLY + assert guess_solve_strategy( x**2 + 1, x ) # == GS_POLY + assert guess_solve_strategy( x**2 - 1, x ) # == GS_POLY + assert guess_solve_strategy( x*y + y, x ) # == GS_POLY + assert guess_solve_strategy( x*exp(y) + y, x) # == GS_POLY + assert guess_solve_strategy( + (x - y**3)/(y**2*sqrt(1 - y**2)), x) # == GS_POLY + + +def test_guess_poly_cv(): + # polynomial equations via a change of variable + assert guess_solve_strategy( sqrt(x) + 1, x ) # == GS_POLY_CV_1 + assert guess_solve_strategy( + x**Rational(1, 3) + sqrt(x) + 1, x ) # == GS_POLY_CV_1 + assert guess_solve_strategy( 4*x*(1 - sqrt(x)), x ) # == GS_POLY_CV_1 + + # polynomial equation multiplying both sides by x**n + assert guess_solve_strategy( x + 1/x + y, x ) # == GS_POLY_CV_2 + + +def test_guess_rational_cv(): + # rational functions + assert guess_solve_strategy( (x + 1)/(x**2 + 2), x) # == GS_RATIONAL + assert guess_solve_strategy( + (x - y**3)/(y**2*sqrt(1 - y**2)), y) # == GS_RATIONAL_CV_1 + + # rational functions via the change of variable y -> x**n + assert guess_solve_strategy( (sqrt(x) + 1)/(x**Rational(1, 3) + sqrt(x) + 1), x ) \ + #== GS_RATIONAL_CV_1 + + +def test_guess_transcendental(): + #transcendental functions + assert guess_solve_strategy( exp(x) + 1, x ) # == GS_TRANSCENDENTAL + assert guess_solve_strategy( 2*cos(x) - y, x ) # == GS_TRANSCENDENTAL + assert guess_solve_strategy( + exp(x) + exp(-x) - y, x ) # == GS_TRANSCENDENTAL + assert guess_solve_strategy(3**x - 10, x) # == GS_TRANSCENDENTAL + assert guess_solve_strategy(-3**x + 10, x) # == GS_TRANSCENDENTAL + + assert guess_solve_strategy(a*x**b - y, x) # == GS_TRANSCENDENTAL + + +def test_solve_args(): + # equation container, issue 5113 + ans = {x: -3, y: 1} + eqs = (x + 5*y - 2, -3*x + 6*y - 15) + assert all(solve(container(eqs), x, y) == ans for container in + (tuple, list, set, frozenset)) + assert solve(Tuple(*eqs), x, y) == ans + # implicit symbol to solve for + assert set(solve(x**2 - 4)) == {S(2), -S(2)} + assert solve([x + y - 3, x - y - 5]) == {x: 4, y: -1} + assert solve(x - exp(x), x, implicit=True) == [exp(x)] + # no symbol to solve for + assert solve(42) == solve(42, x) == [] + assert solve([1, 2]) == [] + assert solve([sqrt(2)],[x]) == [] + # duplicate symbols raises + raises(ValueError, lambda: solve((x - 3, y + 2), x, y, x)) + raises(ValueError, lambda: solve(x, x, x)) + # no error in exclude + assert solve(x, x, exclude=[y, y]) == [0] + # duplicate symbols raises + raises(ValueError, lambda: solve((x - 3, y + 2), x, y, x)) + raises(ValueError, lambda: solve(x, x, x)) + # no error in exclude + assert solve(x, x, exclude=[y, y]) == [0] + # unordered symbols + # only 1 + assert solve(y - 3, {y}) == [3] + # more than 1 + assert solve(y - 3, {x, y}) == [{y: 3}] + # multiple symbols: take the first linear solution+ + # - return as tuple with values for all requested symbols + assert solve(x + y - 3, [x, y]) == [(3 - y, y)] + # - unless dict is True + assert solve(x + y - 3, [x, y], dict=True) == [{x: 3 - y}] + # - or no symbols are given + assert solve(x + y - 3) == [{x: 3 - y}] + # multiple symbols might represent an undetermined coefficients system + assert solve(a + b*x - 2, [a, b]) == {a: 2, b: 0} + assert solve((a + b)*x + b - c, [a, b]) == {a: -c, b: c} + eq = a*x**2 + b*x + c - ((x - h)**2 + 4*p*k)/4/p + # - check that flags are obeyed + sol = solve(eq, [h, p, k], exclude=[a, b, c]) + assert sol == {h: -b/(2*a), k: (4*a*c - b**2)/(4*a), p: 1/(4*a)} + assert solve(eq, [h, p, k], dict=True) == [sol] + assert solve(eq, [h, p, k], set=True) == \ + ([h, p, k], {(-b/(2*a), 1/(4*a), (4*a*c - b**2)/(4*a))}) + # issue 23889 - polysys not simplified + assert solve(eq, [h, p, k], exclude=[a, b, c], simplify=False) == \ + {h: -b/(2*a), k: (4*a*c - b**2)/(4*a), p: 1/(4*a)} + # but this only happens when system has a single solution + args = (a + b)*x - b**2 + 2, a, b + assert solve(*args) == [((b**2 - b*x - 2)/x, b)] + # and if the system has a solution; the following doesn't so + # an algebraic solution is returned + assert solve(a*x + b**2/(x + 4) - 3*x - 4/x, a, b, dict=True) == \ + [{a: (-b**2*x + 3*x**3 + 12*x**2 + 4*x + 16)/(x**2*(x + 4))}] + # failed single equation + assert solve(1/(1/x - y + exp(y))) == [] + raises( + NotImplementedError, lambda: solve(exp(x) + sin(x) + exp(y) + sin(y))) + # failed system + # -- when no symbols given, 1 fails + assert solve([y, exp(x) + x]) == [{x: -LambertW(1), y: 0}] + # both fail + assert solve( + (exp(x) - x, exp(y) - y)) == [{x: -LambertW(-1), y: -LambertW(-1)}] + # -- when symbols given + assert solve([y, exp(x) + x], x, y) == [(-LambertW(1), 0)] + # symbol is a number + assert solve(x**2 - pi, pi) == [x**2] + # no equations + assert solve([], [x]) == [] + # nonlinear system + assert solve((x**2 - 4, y - 2), x, y) == [(-2, 2), (2, 2)] + assert solve((x**2 - 4, y - 2), y, x) == [(2, -2), (2, 2)] + assert solve((x**2 - 4 + z, y - 2 - z), a, z, y, x, set=True + ) == ([a, z, y, x], { + (a, z, z + 2, -sqrt(4 - z)), + (a, z, z + 2, sqrt(4 - z))}) + # overdetermined system + # - nonlinear + assert solve([(x + y)**2 - 4, x + y - 2]) == [{x: -y + 2}] + # - linear + assert solve((x + y - 2, 2*x + 2*y - 4)) == {x: -y + 2} + # When one or more args are Boolean + assert solve(Eq(x**2, 0.0)) == [0.0] # issue 19048 + assert solve([True, Eq(x, 0)], [x], dict=True) == [{x: 0}] + assert solve([Eq(x, x), Eq(x, 0), Eq(x, x+1)], [x], dict=True) == [] + assert not solve([Eq(x, x+1), x < 2], x) + assert solve([Eq(x, 0), x+1<2]) == Eq(x, 0) + assert solve([Eq(x, x), Eq(x, x+1)], x) == [] + assert solve(True, x) == [] + assert solve([x - 1, False], [x], set=True) == ([], set()) + assert solve([-y*(x + y - 1)/2, (y - 1)/x/y + 1/y], + set=True, check=False) == ([x, y], {(1 - y, y), (x, 0)}) + # ordering should be canonical, fastest to order by keys instead + # of by size + assert list(solve((y - 1, x - sqrt(3)*z)).keys()) == [x, y] + # as set always returns as symbols, set even if no solution + assert solve([x - 1, x], (y, x), set=True) == ([y, x], set()) + assert solve([x - 1, x], {y, x}, set=True) == ([x, y], set()) + + +def test_solve_polynomial1(): + assert solve(3*x - 2, x) == [Rational(2, 3)] + assert solve(Eq(3*x, 2), x) == [Rational(2, 3)] + + assert set(solve(x**2 - 1, x)) == {-S.One, S.One} + assert set(solve(Eq(x**2, 1), x)) == {-S.One, S.One} + + assert solve(x - y**3, x) == [y**3] + rx = root(x, 3) + assert solve(x - y**3, y) == [ + rx, -rx/2 - sqrt(3)*I*rx/2, -rx/2 + sqrt(3)*I*rx/2] + a11, a12, a21, a22, b1, b2 = symbols('a11,a12,a21,a22,b1,b2') + + assert solve([a11*x + a12*y - b1, a21*x + a22*y - b2], x, y) == \ + { + x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21), + y: (a11*b2 - a21*b1)/(a11*a22 - a12*a21), + } + + solution = {x: S.Zero, y: S.Zero} + + assert solve((x - y, x + y), x, y ) == solution + assert solve((x - y, x + y), (x, y)) == solution + assert solve((x - y, x + y), [x, y]) == solution + + assert set(solve(x**3 - 15*x - 4, x)) == { + -2 + 3**S.Half, + S(4), + -2 - 3**S.Half + } + + assert set(solve((x**2 - 1)**2 - a, x)) == \ + {sqrt(1 + sqrt(a)), -sqrt(1 + sqrt(a)), + sqrt(1 - sqrt(a)), -sqrt(1 - sqrt(a))} + + +def test_solve_polynomial2(): + assert solve(4, x) == [] + + +def test_solve_polynomial_cv_1a(): + """ + Test for solving on equations that can be converted to a polynomial equation + using the change of variable y -> x**Rational(p, q) + """ + assert solve( sqrt(x) - 1, x) == [1] + assert solve( sqrt(x) - 2, x) == [4] + assert solve( x**Rational(1, 4) - 2, x) == [16] + assert solve( x**Rational(1, 3) - 3, x) == [27] + assert solve(sqrt(x) + x**Rational(1, 3) + x**Rational(1, 4), x) == [0] + + +def test_solve_polynomial_cv_1b(): + assert set(solve(4*x*(1 - a*sqrt(x)), x)) == {S.Zero, 1/a**2} + assert set(solve(x*(root(x, 3) - 3), x)) == {S.Zero, S(27)} + + +def test_solve_polynomial_cv_2(): + """ + Test for solving on equations that can be converted to a polynomial equation + multiplying both sides of the equation by x**m + """ + assert solve(x + 1/x - 1, x) in \ + [[ S.Half + I*sqrt(3)/2, S.Half - I*sqrt(3)/2], + [ S.Half - I*sqrt(3)/2, S.Half + I*sqrt(3)/2]] + + +def test_quintics_1(): + f = x**5 - 110*x**3 - 55*x**2 + 2310*x + 979 + s = solve(f, check=False) + for r in s: + res = f.subs(x, r.n()).n() + assert tn(res, 0) + + f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20 + s = solve(f) + for r in s: + assert r.func == CRootOf + + # if one uses solve to get the roots of a polynomial that has a CRootOf + # solution, make sure that the use of nfloat during the solve process + # doesn't fail. Note: if you want numerical solutions to a polynomial + # it is *much* faster to use nroots to get them than to solve the + # equation only to get RootOf solutions which are then numerically + # evaluated. So for eq = x**5 + 3*x + 7 do Poly(eq).nroots() rather + # than [i.n() for i in solve(eq)] to get the numerical roots of eq. + assert nfloat(solve(x**5 + 3*x**3 + 7)[0], exponent=False) == \ + CRootOf(x**5 + 3*x**3 + 7, 0).n() + + +def test_quintics_2(): + f = x**5 + 15*x + 12 + s = solve(f, check=False) + for r in s: + res = f.subs(x, r.n()).n() + assert tn(res, 0) + + f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20 + s = solve(f) + for r in s: + assert r.func == CRootOf + + assert solve(x**5 - 6*x**3 - 6*x**2 + x - 6) == [ + CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 0), + CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 1), + CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 2), + CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 3), + CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 4)] + +def test_quintics_3(): + y = x**5 + x**3 - 2**Rational(1, 3) + assert solve(y) == solve(-y) == [] + + +def test_highorder_poly(): + # just testing that the uniq generator is unpacked + sol = solve(x**6 - 2*x + 2) + assert all(isinstance(i, CRootOf) for i in sol) and len(sol) == 6 + + +def test_solve_rational(): + """Test solve for rational functions""" + assert solve( ( x - y**3 )/( (y**2)*sqrt(1 - y**2) ), x) == [y**3] + + +def test_solve_conjugate(): + """Test solve for simple conjugate functions""" + assert solve(conjugate(x) -3 + I) == [3 + I] + + +def test_solve_nonlinear(): + assert solve(x**2 - y**2, x, y, dict=True) == [{x: -y}, {x: y}] + assert solve(x**2 - y**2/exp(x), y, x, dict=True) == [{y: -x*sqrt(exp(x))}, + {y: x*sqrt(exp(x))}] + + +def test_issue_8666(): + x = symbols('x') + assert solve(Eq(x**2 - 1/(x**2 - 4), 4 - 1/(x**2 - 4)), x) == [] + assert solve(Eq(x + 1/x, 1/x), x) == [] + + +def test_issue_7228(): + assert solve(4**(2*(x**2) + 2*x) - 8, x) == [Rational(-3, 2), S.Half] + + +def test_issue_7190(): + assert solve(log(x-3) + log(x+3), x) == [sqrt(10)] + + +def test_issue_21004(): + x = symbols('x') + f = x/sqrt(x**2+1) + f_diff = f.diff(x) + assert solve(f_diff, x) == [] + + +def test_issue_24650(): + x = symbols('x') + r = solve(Eq(Piecewise((x, Eq(x, 0) | (x > 1))), 0)) + assert r == [0] + r = checksol(Eq(Piecewise((x, Eq(x, 0) | (x > 1))), 0), x, sol=0) + assert r is True + + +def test_linear_system(): + x, y, z, t, n = symbols('x, y, z, t, n') + + assert solve([x - 1, x - y, x - 2*y, y - 1], [x, y]) == [] + + assert solve([x - 1, x - y, x - 2*y, x - 1], [x, y]) == [] + assert solve([x - 1, x - 1, x - y, x - 2*y], [x, y]) == [] + + assert solve([x + 5*y - 2, -3*x + 6*y - 15], x, y) == {x: -3, y: 1} + + M = Matrix([[0, 0, n*(n + 1), (n + 1)**2, 0], + [n + 1, n + 1, -2*n - 1, -(n + 1), 0], + [-1, 0, 1, 0, 0]]) + + assert solve_linear_system(M, x, y, z, t) == \ + {x: t*(-n-1)/n, y: 0, z: t*(-n-1)/n} + + assert solve([x + y + z + t, -z - t], x, y, z, t) == {x: -y, z: -t} + + +@XFAIL +def test_linear_system_xfail(): + # https://github.com/sympy/sympy/issues/6420 + M = Matrix([[0, 15.0, 10.0, 700.0], + [1, 1, 1, 100.0], + [0, 10.0, 5.0, 200.0], + [-5.0, 0, 0, 0 ]]) + + assert solve_linear_system(M, x, y, z) == {x: 0, y: -60.0, z: 160.0} + + +def test_linear_system_function(): + a = Function('a') + assert solve([a(0, 0) + a(0, 1) + a(1, 0) + a(1, 1), -a(1, 0) - a(1, 1)], + a(0, 0), a(0, 1), a(1, 0), a(1, 1)) == {a(1, 0): -a(1, 1), a(0, 0): -a(0, 1)} + + +def test_linear_system_symbols_doesnt_hang_1(): + + def _mk_eqs(wy): + # Equations for fitting a wy*2 - 1 degree polynomial between two points, + # at end points derivatives are known up to order: wy - 1 + order = 2*wy - 1 + x, x0, x1 = symbols('x, x0, x1', real=True) + y0s = symbols('y0_:{}'.format(wy), real=True) + y1s = symbols('y1_:{}'.format(wy), real=True) + c = symbols('c_:{}'.format(order+1), real=True) + + expr = sum(coeff*x**o for o, coeff in enumerate(c)) + eqs = [] + for i in range(wy): + eqs.append(expr.diff(x, i).subs({x: x0}) - y0s[i]) + eqs.append(expr.diff(x, i).subs({x: x1}) - y1s[i]) + return eqs, c + + # + # The purpose of this test is just to see that these calls don't hang. The + # expressions returned are complicated so are not included here. Testing + # their correctness takes longer than solving the system. + # + + for n in range(1, 7+1): + eqs, c = _mk_eqs(n) + solve(eqs, c) + + +def test_linear_system_symbols_doesnt_hang_2(): + + M = Matrix([ + [66, 24, 39, 50, 88, 40, 37, 96, 16, 65, 31, 11, 37, 72, 16, 19, 55, 37, 28, 76], + [10, 93, 34, 98, 59, 44, 67, 74, 74, 94, 71, 61, 60, 23, 6, 2, 57, 8, 29, 78], + [19, 91, 57, 13, 64, 65, 24, 53, 77, 34, 85, 58, 87, 39, 39, 7, 36, 67, 91, 3], + [74, 70, 15, 53, 68, 43, 86, 83, 81, 72, 25, 46, 67, 17, 59, 25, 78, 39, 63, 6], + [69, 40, 67, 21, 67, 40, 17, 13, 93, 44, 46, 89, 62, 31, 30, 38, 18, 20, 12, 81], + [50, 22, 74, 76, 34, 45, 19, 76, 28, 28, 11, 99, 97, 82, 8, 46, 99, 57, 68, 35], + [58, 18, 45, 88, 10, 64, 9, 34, 90, 82, 17, 41, 43, 81, 45, 83, 22, 88, 24, 39], + [42, 21, 70, 68, 6, 33, 64, 81, 83, 15, 86, 75, 86, 17, 77, 34, 62, 72, 20, 24], + [ 7, 8, 2, 72, 71, 52, 96, 5, 32, 51, 31, 36, 79, 88, 25, 77, 29, 26, 33, 13], + [19, 31, 30, 85, 81, 39, 63, 28, 19, 12, 16, 49, 37, 66, 38, 13, 3, 71, 61, 51], + [29, 82, 80, 49, 26, 85, 1, 37, 2, 74, 54, 82, 26, 47, 54, 9, 35, 0, 99, 40], + [15, 49, 82, 91, 93, 57, 45, 25, 45, 97, 15, 98, 48, 52, 66, 24, 62, 54, 97, 37], + [62, 23, 73, 53, 52, 86, 28, 38, 0, 74, 92, 38, 97, 70, 71, 29, 26, 90, 67, 45], + [ 2, 32, 23, 24, 71, 37, 25, 71, 5, 41, 97, 65, 93, 13, 65, 45, 25, 88, 69, 50], + [40, 56, 1, 29, 79, 98, 79, 62, 37, 28, 45, 47, 3, 1, 32, 74, 98, 35, 84, 32], + [33, 15, 87, 79, 65, 9, 14, 63, 24, 19, 46, 28, 74, 20, 29, 96, 84, 91, 93, 1], + [97, 18, 12, 52, 1, 2, 50, 14, 52, 76, 19, 82, 41, 73, 51, 79, 13, 3, 82, 96], + [40, 28, 52, 10, 10, 71, 56, 78, 82, 5, 29, 48, 1, 26, 16, 18, 50, 76, 86, 52], + [38, 89, 83, 43, 29, 52, 90, 77, 57, 0, 67, 20, 81, 88, 48, 96, 88, 58, 14, 3]]) + + syms = x0,x1,x2,x3,x4,x5,x6,x7,x8,x9,x10,x11,x12,x13,x14,x15,x16,x17,x18 = symbols('x:19') + + sol = { + x0: -S(1967374186044955317099186851240896179)/3166636564687820453598895768302256588, + x1: -S(84268280268757263347292368432053826)/791659141171955113399723942075564147, + x2: -S(229962957341664730974463872411844965)/1583318282343910226799447884151128294, + x3: S(990156781744251750886760432229180537)/6333273129375640907197791536604513176, + x4: -S(2169830351210066092046760299593096265)/18999819388126922721593374609813539528, + x5: S(4680868883477577389628494526618745355)/9499909694063461360796687304906769764, + x6: -S(1590820774344371990683178396480879213)/3166636564687820453598895768302256588, + x7: -S(54104723404825537735226491634383072)/339282489073695048599881689460956063, + x8: S(3182076494196560075964847771774733847)/6333273129375640907197791536604513176, + x9: -S(10870817431029210431989147852497539675)/18999819388126922721593374609813539528, + x10: -S(13118019242576506476316318268573312603)/18999819388126922721593374609813539528, + x11: -S(5173852969886775824855781403820641259)/4749954847031730680398343652453384882, + x12: S(4261112042731942783763341580651820563)/4749954847031730680398343652453384882, + x13: -S(821833082694661608993818117038209051)/6333273129375640907197791536604513176, + x14: S(906881575107250690508618713632090559)/904753304196520129599684505229216168, + x15: -S(732162528717458388995329317371283987)/6333273129375640907197791536604513176, + x16: S(4524215476705983545537087360959896817)/9499909694063461360796687304906769764, + x17: -S(3898571347562055611881270844646055217)/6333273129375640907197791536604513176, + x18: S(7513502486176995632751685137907442269)/18999819388126922721593374609813539528 + } + + eqs = list(M * Matrix(syms + (1,))) + assert solve(eqs, syms) == sol + + y = Symbol('y') + eqs = list(y * M * Matrix(syms + (1,))) + assert solve(eqs, syms) == sol + + +def test_linear_systemLU(): + n = Symbol('n') + + M = Matrix([[1, 2, 0, 1], [1, 3, 2*n, 1], [4, -1, n**2, 1]]) + + assert solve_linear_system_LU(M, [x, y, z]) == {z: -3/(n**2 + 18*n), + x: 1 - 12*n/(n**2 + 18*n), + y: 6*n/(n**2 + 18*n)} + +# Note: multiple solutions exist for some of these equations, so the tests +# should be expected to break if the implementation of the solver changes +# in such a way that a different branch is chosen + +@slow +def test_solve_transcendental(): + from sympy.abc import a, b + + assert solve(exp(x) - 3, x) == [log(3)] + assert set(solve((a*x + b)*(exp(x) - 3), x)) == {-b/a, log(3)} + assert solve(cos(x) - y, x) == [-acos(y) + 2*pi, acos(y)] + assert solve(2*cos(x) - y, x) == [-acos(y/2) + 2*pi, acos(y/2)] + assert solve(Eq(cos(x), sin(x)), x) == [pi/4] + + assert set(solve(exp(x) + exp(-x) - y, x)) in [{ + log(y/2 - sqrt(y**2 - 4)/2), + log(y/2 + sqrt(y**2 - 4)/2), + }, { + log(y - sqrt(y**2 - 4)) - log(2), + log(y + sqrt(y**2 - 4)) - log(2)}, + { + log(y/2 - sqrt((y - 2)*(y + 2))/2), + log(y/2 + sqrt((y - 2)*(y + 2))/2)}] + assert solve(exp(x) - 3, x) == [log(3)] + assert solve(Eq(exp(x), 3), x) == [log(3)] + assert solve(log(x) - 3, x) == [exp(3)] + assert solve(sqrt(3*x) - 4, x) == [Rational(16, 3)] + assert solve(3**(x + 2), x) == [] + assert solve(3**(2 - x), x) == [] + assert solve(x + 2**x, x) == [-LambertW(log(2))/log(2)] + assert solve(2*x + 5 + log(3*x - 2), x) == \ + [Rational(2, 3) + LambertW(2*exp(Rational(-19, 3))/3)/2] + assert solve(3*x + log(4*x), x) == [LambertW(Rational(3, 4))/3] + assert set(solve((2*x + 8)*(8 + exp(x)), x)) == {S(-4), log(8) + pi*I} + eq = 2*exp(3*x + 4) - 3 + ans = solve(eq, x) # this generated a failure in flatten + assert len(ans) == 3 and all(eq.subs(x, a).n(chop=True) == 0 for a in ans) + assert solve(2*log(3*x + 4) - 3, x) == [(exp(Rational(3, 2)) - 4)/3] + assert solve(exp(x) + 1, x) == [pi*I] + + eq = 2*(3*x + 4)**5 - 6*7**(3*x + 9) + result = solve(eq, x) + x0 = -log(2401) + x1 = 3**Rational(1, 5) + x2 = log(7**(7*x1/20)) + x3 = sqrt(2) + x4 = sqrt(5) + x5 = x3*sqrt(x4 - 5) + x6 = x4 + 1 + x7 = 1/(3*log(7)) + x8 = -x4 + x9 = x3*sqrt(x8 - 5) + x10 = x8 + 1 + ans = [x7*(x0 - 5*LambertW(x2*(-x5 + x6))), + x7*(x0 - 5*LambertW(x2*(x5 + x6))), + x7*(x0 - 5*LambertW(x2*(x10 - x9))), + x7*(x0 - 5*LambertW(x2*(x10 + x9))), + x7*(x0 - 5*LambertW(-log(7**(7*x1/5))))] + assert result == ans, result + # it works if expanded, too + assert solve(eq.expand(), x) == result + + assert solve(z*cos(x) - y, x) == [-acos(y/z) + 2*pi, acos(y/z)] + assert solve(z*cos(2*x) - y, x) == [-acos(y/z)/2 + pi, acos(y/z)/2] + assert solve(z*cos(sin(x)) - y, x) == [ + pi - asin(acos(y/z)), asin(acos(y/z) - 2*pi) + pi, + -asin(acos(y/z) - 2*pi), asin(acos(y/z))] + + assert solve(z*cos(x), x) == [pi/2, pi*Rational(3, 2)] + + # issue 4508 + assert solve(y - b*x/(a + x), x) in [[-a*y/(y - b)], [a*y/(b - y)]] + assert solve(y - b*exp(a/x), x) == [a/log(y/b)] + # issue 4507 + assert solve(y - b/(1 + a*x), x) in [[(b - y)/(a*y)], [-((y - b)/(a*y))]] + # issue 4506 + assert solve(y - a*x**b, x) == [(y/a)**(1/b)] + # issue 4505 + assert solve(z**x - y, x) == [log(y)/log(z)] + # issue 4504 + assert solve(2**x - 10, x) == [1 + log(5)/log(2)] + # issue 6744 + assert solve(x*y) == [{x: 0}, {y: 0}] + assert solve([x*y]) == [{x: 0}, {y: 0}] + assert solve(x**y - 1) == [{x: 1}, {y: 0}] + assert solve([x**y - 1]) == [{x: 1}, {y: 0}] + assert solve(x*y*(x**2 - y**2)) == [{x: 0}, {x: -y}, {x: y}, {y: 0}] + assert solve([x*y*(x**2 - y**2)]) == [{x: 0}, {x: -y}, {x: y}, {y: 0}] + # issue 4739 + assert solve(exp(log(5)*x) - 2**x, x) == [0] + # issue 14791 + assert solve(exp(log(5)*x) - exp(log(2)*x), x) == [0] + f = Function('f') + assert solve(y*f(log(5)*x) - y*f(log(2)*x), x) == [0] + assert solve(f(x) - f(0), x) == [0] + assert solve(f(x) - f(2 - x), x) == [1] + raises(NotImplementedError, lambda: solve(f(x, y) - f(1, 2), x)) + raises(NotImplementedError, lambda: solve(f(x, y) - f(2 - x, 2), x)) + raises(ValueError, lambda: solve(f(x, y) - f(1 - x), x)) + raises(ValueError, lambda: solve(f(x, y) - f(1), x)) + + # misc + # make sure that the right variables is picked up in tsolve + # shouldn't generate a GeneratorsNeeded error in _tsolve when the NaN is generated + # for eq_down. Actual answers, as determined numerically are approx. +/- 0.83 + raises(NotImplementedError, lambda: + solve(sinh(x)*sinh(sinh(x)) + cosh(x)*cosh(sinh(x)) - 3)) + + # watch out for recursive loop in tsolve + raises(NotImplementedError, lambda: solve((x + 2)**y*x - 3, x)) + + # issue 7245 + assert solve(sin(sqrt(x))) == [0, pi**2] + + # issue 7602 + a, b = symbols('a, b', real=True, negative=False) + assert str(solve(Eq(a, 0.5 - cos(pi*b)/2), b)) == \ + '[2.0 - 0.318309886183791*acos(1.0 - 2.0*a), 0.318309886183791*acos(1.0 - 2.0*a)]' + + # issue 15325 + assert solve(y**(1/x) - z, x) == [log(y)/log(z)] + + # issue 25685 (basic trig identities should give simple solutions) + for yi in [cos(2*x),sin(2*x),cos(x - pi/3)]: + sol = solve([cos(x) - S(3)/5, yi - y]) + assert (sol[0][y] + sol[1][y]).is_Rational, (yi,sol) + # don't allow massive expansion + assert solve(cos(1000*x) - S.Half) == [pi/3000, pi/600] + assert solve(cos(x - 1000*y) - 1, x) == [1000*y, 1000*y + 2*pi] + assert solve(cos(x + y + z) - 1, x) == [-y - z, -y - z + 2*pi] + + # issue 26008 + assert solve(sin(x + pi/6)) == [-pi/6, 5*pi/6] + + +def test_solve_for_functions_derivatives(): + t = Symbol('t') + x = Function('x')(t) + y = Function('y')(t) + a11, a12, a21, a22, b1, b2 = symbols('a11,a12,a21,a22,b1,b2') + + soln = solve([a11*x + a12*y - b1, a21*x + a22*y - b2], x, y) + assert soln == { + x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21), + y: (a11*b2 - a21*b1)/(a11*a22 - a12*a21), + } + + assert solve(x - 1, x) == [1] + assert solve(3*x - 2, x) == [Rational(2, 3)] + + soln = solve([a11*x.diff(t) + a12*y.diff(t) - b1, a21*x.diff(t) + + a22*y.diff(t) - b2], x.diff(t), y.diff(t)) + assert soln == { y.diff(t): (a11*b2 - a21*b1)/(a11*a22 - a12*a21), + x.diff(t): (a22*b1 - a12*b2)/(a11*a22 - a12*a21) } + + assert solve(x.diff(t) - 1, x.diff(t)) == [1] + assert solve(3*x.diff(t) - 2, x.diff(t)) == [Rational(2, 3)] + + eqns = {3*x - 1, 2*y - 4} + assert solve(eqns, {x, y}) == { x: Rational(1, 3), y: 2 } + x = Symbol('x') + f = Function('f') + F = x**2 + f(x)**2 - 4*x - 1 + assert solve(F.diff(x), diff(f(x), x)) == [(-x + 2)/f(x)] + + # Mixed cased with a Symbol and a Function + x = Symbol('x') + y = Function('y')(t) + + soln = solve([a11*x + a12*y.diff(t) - b1, a21*x + + a22*y.diff(t) - b2], x, y.diff(t)) + assert soln == { y.diff(t): (a11*b2 - a21*b1)/(a11*a22 - a12*a21), + x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21) } + + # issue 13263 + x = Symbol('x') + f = Function('f') + soln = solve([f(x).diff(x) + f(x).diff(x, 2) - 1, f(x).diff(x) - f(x).diff(x, 2)], + f(x).diff(x), f(x).diff(x, 2)) + assert soln == { f(x).diff(x, 2): S(1)/2, f(x).diff(x): S(1)/2 } + + soln = solve([f(x).diff(x, 2) + f(x).diff(x, 3) - 1, 1 - f(x).diff(x, 2) - + f(x).diff(x, 3), 1 - f(x).diff(x,3)], f(x).diff(x, 2), f(x).diff(x, 3)) + assert soln == { f(x).diff(x, 2): 0, f(x).diff(x, 3): 1 } + + +def test_issue_3725(): + f = Function('f') + F = x**2 + f(x)**2 - 4*x - 1 + e = F.diff(x) + assert solve(e, f(x).diff(x)) in [[(2 - x)/f(x)], [-((x - 2)/f(x))]] + + +def test_solve_Matrix(): + # https://github.com/sympy/sympy/issues/3870 + a, b, c, d = symbols('a b c d') + A = Matrix(2, 2, [a, b, c, d]) + B = Matrix(2, 2, [0, 2, -3, 0]) + C = Matrix(2, 2, [1, 2, 3, 4]) + + assert solve(A*B - C, [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1} + assert solve([A*B - C], [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1} + assert solve(Eq(A*B, C), [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1} + + assert solve([A*B - B*A], [a, b, c, d]) == {a: d, b: Rational(-2, 3)*c} + assert solve([A*C - C*A], [a, b, c, d]) == {a: d - c, b: Rational(2, 3)*c} + assert solve([A*B - B*A, A*C - C*A], [a, b, c, d]) == {a: d, b: 0, c: 0} + + assert solve([Eq(A*B, B*A)], [a, b, c, d]) == {a: d, b: Rational(-2, 3)*c} + assert solve([Eq(A*C, C*A)], [a, b, c, d]) == {a: d - c, b: Rational(2, 3)*c} + assert solve([Eq(A*B, B*A), Eq(A*C, C*A)], [a, b, c, d]) == {a: d, b: 0, c: 0} + + # https://github.com/sympy/sympy/issues/27854 + m, n = symbols("m n") + A = MatrixSymbol("A", m, n) + x = MatrixSymbol("x", n, 1) + b = MatrixSymbol('b', m, 1) + r = A * x - b + f = r.T * r + grad_f = f.diff(x) + raises(ValueError, lambda: solve(grad_f, x)) + + +def test_solve_linear(): + w = Wild('w') + assert solve_linear(x, x) == (0, 1) + assert solve_linear(x, exclude=[x]) == (0, 1) + assert solve_linear(x, symbols=[w]) == (0, 1) + assert solve_linear(x, y - 2*x) in [(x, y/3), (y, 3*x)] + assert solve_linear(x, y - 2*x, exclude=[x]) == (y, 3*x) + assert solve_linear(3*x - y, 0) in [(x, y/3), (y, 3*x)] + assert solve_linear(3*x - y, 0, [x]) == (x, y/3) + assert solve_linear(3*x - y, 0, [y]) == (y, 3*x) + assert solve_linear(x**2/y, 1) == (y, x**2) + assert solve_linear(w, x) in [(w, x), (x, w)] + assert solve_linear(cos(x)**2 + sin(x)**2 + 2 + y) == \ + (y, -2 - cos(x)**2 - sin(x)**2) + assert solve_linear(cos(x)**2 + sin(x)**2 + 2 + y, symbols=[x]) == (0, 1) + assert solve_linear(Eq(x, 3)) == (x, 3) + assert solve_linear(1/(1/x - 2)) == (0, 0) + assert solve_linear((x + 1)*exp(-x), symbols=[x]) == (x, -1) + assert solve_linear((x + 1)*exp(x), symbols=[x]) == ((x + 1)*exp(x), 1) + assert solve_linear(x*exp(-x**2), symbols=[x]) == (x, 0) + assert solve_linear(0**x - 1) == (0**x - 1, 1) + assert solve_linear(1 + 1/(x - 1)) == (x, 0) + eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0 + assert solve_linear(eq) == (0, 1) + eq = cos(x)**2 + sin(x)**2 # = 1 + assert solve_linear(eq) == (0, 1) + raises(ValueError, lambda: solve_linear(Eq(x, 3), 3)) + + +def test_solve_undetermined_coeffs(): + assert solve_undetermined_coeffs( + a*x**2 + b*x**2 + b*x + 2*c*x + c + 1, [a, b, c], x + ) == {a: -2, b: 2, c: -1} + # Test that rational functions work + assert solve_undetermined_coeffs(a/x + b/(x + 1) + - (2*x + 1)/(x**2 + x), [a, b], x) == {a: 1, b: 1} + # Test cancellation in rational functions + assert solve_undetermined_coeffs( + ((c + 1)*a*x**2 + (c + 1)*b*x**2 + + (c + 1)*b*x + (c + 1)*2*c*x + (c + 1)**2)/(c + 1), + [a, b, c], x) == \ + {a: -2, b: 2, c: -1} + # multivariate + X, Y, Z = y, x**y, y*x**y + eq = a*X + b*Y + c*Z - X - 2*Y - 3*Z + coeffs = a, b, c + syms = x, y + assert solve_undetermined_coeffs(eq, coeffs) == { + a: 1, b: 2, c: 3} + assert solve_undetermined_coeffs(eq, coeffs, syms) == { + a: 1, b: 2, c: 3} + assert solve_undetermined_coeffs(eq, coeffs, *syms) == { + a: 1, b: 2, c: 3} + # check output format + assert solve_undetermined_coeffs(a*x + a - 2, [a]) == [] + assert solve_undetermined_coeffs(a**2*x - 4*x, [a]) == [ + {a: -2}, {a: 2}] + assert solve_undetermined_coeffs(0, [a]) == [] + assert solve_undetermined_coeffs(0, [a], dict=True) == [] + assert solve_undetermined_coeffs(0, [a], set=True) == ([], {}) + assert solve_undetermined_coeffs(1, [a]) == [] + abeq = a*x - 2*x + b - 3 + s = {b, a} + assert solve_undetermined_coeffs(abeq, s, x) == {a: 2, b: 3} + assert solve_undetermined_coeffs(abeq, s, x, set=True) == ([a, b], {(2, 3)}) + assert solve_undetermined_coeffs(sin(a*x) - sin(2*x), (a,)) is None + assert solve_undetermined_coeffs(a*x + b*x - 2*x, (a, b)) == {a: 2 - b} + + +def test_solve_inequalities(): + x = Symbol('x') + sol = And(S.Zero < x, x < oo) + assert solve(x + 1 > 1) == sol + assert solve([x + 1 > 1]) == sol + assert solve([x + 1 > 1], x) == sol + assert solve([x + 1 > 1], [x]) == sol + + system = [Lt(x**2 - 2, 0), Gt(x**2 - 1, 0)] + assert solve(system) == \ + And(Or(And(Lt(-sqrt(2), x), Lt(x, -1)), + And(Lt(1, x), Lt(x, sqrt(2)))), Eq(0, 0)) + + x = Symbol('x', real=True) + system = [Lt(x**2 - 2, 0), Gt(x**2 - 1, 0)] + assert solve(system) == \ + Or(And(Lt(-sqrt(2), x), Lt(x, -1)), And(Lt(1, x), Lt(x, sqrt(2)))) + + # issues 6627, 3448 + assert solve((x - 3)/(x - 2) < 0, x) == And(Lt(2, x), Lt(x, 3)) + assert solve(x/(x + 1) > 1, x) == And(Lt(-oo, x), Lt(x, -1)) + + assert solve(sin(x) > S.Half) == And(pi/6 < x, x < pi*Rational(5, 6)) + + assert solve(Eq(False, x < 1)) == (S.One <= x) & (x < oo) + assert solve(Eq(True, x < 1)) == (-oo < x) & (x < 1) + assert solve(Eq(x < 1, False)) == (S.One <= x) & (x < oo) + assert solve(Eq(x < 1, True)) == (-oo < x) & (x < 1) + + assert solve(Eq(False, x)) == False + assert solve(Eq(0, x)) == [0] + assert solve(Eq(True, x)) == True + assert solve(Eq(1, x)) == [1] + assert solve(Eq(False, ~x)) == True + assert solve(Eq(True, ~x)) == False + assert solve(Ne(True, x)) == False + assert solve(Ne(1, x)) == (x > -oo) & (x < oo) & Ne(x, 1) + + +def test_issue_4793(): + assert solve(1/x) == [] + assert solve(x*(1 - 5/x)) == [5] + assert solve(x + sqrt(x) - 2) == [1] + assert solve(-(1 + x)/(2 + x)**2 + 1/(2 + x)) == [] + assert solve(-x**2 - 2*x + (x + 1)**2 - 1) == [] + assert solve((x/(x + 1) + 3)**(-2)) == [] + assert solve(x/sqrt(x**2 + 1), x) == [0] + assert solve(exp(x) - y, x) == [log(y)] + assert solve(exp(x)) == [] + assert solve(x**2 + x + sin(y)**2 + cos(y)**2 - 1, x) in [[0, -1], [-1, 0]] + eq = 4*3**(5*x + 2) - 7 + ans = solve(eq, x) + assert len(ans) == 5 and all(eq.subs(x, a).n(chop=True) == 0 for a in ans) + assert solve(log(x**2) - y**2/exp(x), x, y, set=True) == ( + [x, y], + {(x, sqrt(exp(x) * log(x ** 2))), (x, -sqrt(exp(x) * log(x ** 2)))}) + assert solve(x**2*z**2 - z**2*y**2) == [{x: -y}, {x: y}, {z: 0}] + assert solve((x - 1)/(1 + 1/(x - 1))) == [] + assert solve(x**(y*z) - x, x) == [1] + raises(NotImplementedError, lambda: solve(log(x) - exp(x), x)) + raises(NotImplementedError, lambda: solve(2**x - exp(x) - 3)) + + +def test_PR1964(): + # issue 5171 + assert solve(sqrt(x)) == solve(sqrt(x**3)) == [0] + assert solve(sqrt(x - 1)) == [1] + # issue 4462 + a = Symbol('a') + assert solve(-3*a/sqrt(x), x) == [] + # issue 4486 + assert solve(2*x/(x + 2) - 1, x) == [2] + # issue 4496 + assert set(solve((x**2/(7 - x)).diff(x))) == {S.Zero, S(14)} + # issue 4695 + f = Function('f') + assert solve((3 - 5*x/f(x))*f(x), f(x)) == [x*Rational(5, 3)] + # issue 4497 + assert solve(1/root(5 + x, 5) - 9, x) == [Rational(-295244, 59049)] + + assert solve(sqrt(x) + sqrt(sqrt(x)) - 4) == [(Rational(-1, 2) + sqrt(17)/2)**4] + assert set(solve(Poly(sqrt(exp(x)) + sqrt(exp(-x)) - 4))) in \ + [ + {log((-sqrt(3) + 2)**2), log((sqrt(3) + 2)**2)}, + {2*log(-sqrt(3) + 2), 2*log(sqrt(3) + 2)}, + {log(-4*sqrt(3) + 7), log(4*sqrt(3) + 7)}, + ] + assert set(solve(Poly(exp(x) + exp(-x) - 4))) == \ + {log(-sqrt(3) + 2), log(sqrt(3) + 2)} + assert set(solve(x**y + x**(2*y) - 1, x)) == \ + {(Rational(-1, 2) + sqrt(5)/2)**(1/y), (Rational(-1, 2) - sqrt(5)/2)**(1/y)} + + assert solve(exp(x/y)*exp(-z/y) - 2, y) == [(x - z)/log(2)] + assert solve( + x**z*y**z - 2, z) in [[log(2)/(log(x) + log(y))], [log(2)/(log(x*y))]] + # if you do inversion too soon then multiple roots (as for the following) + # will be missed, e.g. if exp(3*x) = exp(3) -> 3*x = 3 + E = S.Exp1 + assert solve(exp(3*x) - exp(3), x) in [ + [1, log(E*(Rational(-1, 2) - sqrt(3)*I/2)), log(E*(Rational(-1, 2) + sqrt(3)*I/2))], + [1, log(-E/2 - sqrt(3)*E*I/2), log(-E/2 + sqrt(3)*E*I/2)], + ] + + # coverage test + p = Symbol('p', positive=True) + assert solve((1/p + 1)**(p + 1)) == [] + + +def test_issue_5197(): + x = Symbol('x', real=True) + assert solve(x**2 + 1, x) == [] + n = Symbol('n', integer=True, positive=True) + assert solve((n - 1)*(n + 2)*(2*n - 1), n) == [1] + x = Symbol('x', positive=True) + y = Symbol('y') + assert solve([x + 5*y - 2, -3*x + 6*y - 15], x, y) == [] + # not {x: -3, y: 1} b/c x is positive + # The solution following should not contain (-sqrt(2), sqrt(2)) + assert solve([(x + y), 2 - y**2], x, y) == [(sqrt(2), -sqrt(2))] + y = Symbol('y', positive=True) + # The solution following should not contain {y: -x*exp(x/2)} + assert solve(x**2 - y**2/exp(x), y, x, dict=True) == [{y: x*exp(x/2)}] + x, y, z = symbols('x y z', positive=True) + assert solve(z**2*x**2 - z**2*y**2/exp(x), y, x, z, dict=True) == [{y: x*exp(x/2)}] + + +def test_checking(): + assert set( + solve(x*(x - y/x), x, check=False)) == {sqrt(y), S.Zero, -sqrt(y)} + assert set(solve(x*(x - y/x), x, check=True)) == {sqrt(y), -sqrt(y)} + # {x: 0, y: 4} sets denominator to 0 in the following so system should return None + assert solve((1/(1/x + 2), 1/(y - 3) - 1)) == [] + # 0 sets denominator of 1/x to zero so None is returned + assert solve(1/(1/x + 2)) == [] + + +def test_issue_4671_4463_4467(): + assert solve(sqrt(x**2 - 1) - 2) in ([sqrt(5), -sqrt(5)], + [-sqrt(5), sqrt(5)]) + assert solve((2**exp(y**2/x) + 2)/(x**2 + 15), y) == [ + -sqrt(x*log(1 + I*pi/log(2))), sqrt(x*log(1 + I*pi/log(2)))] + + C1, C2 = symbols('C1 C2') + f = Function('f') + assert solve(C1 + C2/x**2 - exp(-f(x)), f(x)) == [log(x**2/(C1*x**2 + C2))] + a = Symbol('a') + E = S.Exp1 + assert solve(1 - log(a + 4*x**2), x) in ( + [-sqrt(-a + E)/2, sqrt(-a + E)/2], + [sqrt(-a + E)/2, -sqrt(-a + E)/2] + ) + assert solve(log(a**(-3) - x**2)/a, x) in ( + [-sqrt(-1 + a**(-3)), sqrt(-1 + a**(-3))], + [sqrt(-1 + a**(-3)), -sqrt(-1 + a**(-3))],) + assert solve(1 - log(a + 4*x**2), x) in ( + [-sqrt(-a + E)/2, sqrt(-a + E)/2], + [sqrt(-a + E)/2, -sqrt(-a + E)/2],) + assert solve((a**2 + 1)*(sin(a*x) + cos(a*x)), x) == [-pi/(4*a)] + assert solve(3 - (sinh(a*x) + cosh(a*x)), x) == [log(3)/a] + assert set(solve(3 - (sinh(a*x) + cosh(a*x)**2), x)) == \ + {log(-2 + sqrt(5))/a, log(-sqrt(2) + 1)/a, + log(-sqrt(5) - 2)/a, log(1 + sqrt(2))/a} + assert solve(atan(x) - 1) == [tan(1)] + + +def test_issue_5132(): + r, t = symbols('r,t') + assert set(solve([r - x**2 - y**2, tan(t) - y/x], [x, y])) == \ + {( + -sqrt(r*cos(t)**2), -1*sqrt(r*cos(t)**2)*tan(t)), + (sqrt(r*cos(t)**2), sqrt(r*cos(t)**2)*tan(t))} + assert solve([exp(x) - sin(y), 1/y - 3], [x, y]) == \ + [(log(sin(Rational(1, 3))), Rational(1, 3))] + assert solve([exp(x) - sin(y), 1/exp(y) - 3], [x, y]) == \ + [(log(-sin(log(3))), -log(3))] + assert set(solve([exp(x) - sin(y), y**2 - 4], [x, y])) == \ + {(log(-sin(2)), -S(2)), (log(sin(2)), S(2))} + eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3] + assert solve(eqs, set=True) == \ + ([y, z], { + (-log(3), sqrt(-exp(2*x) - sin(log(3)))), + (-log(3), -sqrt(-exp(2*x) - sin(log(3))))}) + assert solve(eqs, x, z, set=True) == ( + [x, z], + {(x, sqrt(-exp(2*x) + sin(y))), (x, -sqrt(-exp(2*x) + sin(y)))}) + assert set(solve(eqs, x, y)) == \ + { + (log(-sqrt(-z**2 - sin(log(3)))), -log(3)), + (log(-z**2 - sin(log(3)))/2, -log(3))} + assert set(solve(eqs, y, z)) == \ + { + (-log(3), -sqrt(-exp(2*x) - sin(log(3)))), + (-log(3), sqrt(-exp(2*x) - sin(log(3))))} + eqs = [exp(x)**2 - sin(y) + z, 1/exp(y) - 3] + assert solve(eqs, set=True) == ([y, z], { + (-log(3), -exp(2*x) - sin(log(3)))}) + assert solve(eqs, x, z, set=True) == ( + [x, z], {(x, -exp(2*x) + sin(y))}) + assert set(solve(eqs, x, y)) == { + (log(-sqrt(-z - sin(log(3)))), -log(3)), + (log(-z - sin(log(3)))/2, -log(3))} + assert solve(eqs, z, y) == \ + [(-exp(2*x) - sin(log(3)), -log(3))] + assert solve((sqrt(x**2 + y**2) - sqrt(10), x + y - 4), set=True) == ( + [x, y], {(S.One, S(3)), (S(3), S.One)}) + assert set(solve((sqrt(x**2 + y**2) - sqrt(10), x + y - 4), x, y)) == \ + {(S.One, S(3)), (S(3), S.One)} + + +def test_issue_5335(): + lam, a0, conc = symbols('lam a0 conc') + a = 0.005 + b = 0.743436700916726 + eqs = [lam + 2*y - a0*(1 - x/2)*x - a*x/2*x, + a0*(1 - x/2)*x - 1*y - b*y, + x + y - conc] + sym = [x, y, a0] + # there are 4 solutions obtained manually but only two are valid + assert len(solve(eqs, sym, manual=True, minimal=True)) == 2 + assert len(solve(eqs, sym)) == 2 # cf below with rational=False + + +@SKIP("Hangs") +def _test_issue_5335_float(): + # gives ZeroDivisionError: polynomial division + lam, a0, conc = symbols('lam a0 conc') + a = 0.005 + b = 0.743436700916726 + eqs = [lam + 2*y - a0*(1 - x/2)*x - a*x/2*x, + a0*(1 - x/2)*x - 1*y - b*y, + x + y - conc] + sym = [x, y, a0] + assert len(solve(eqs, sym, rational=False)) == 2 + + +def test_issue_5767(): + assert set(solve([x**2 + y + 4], [x])) == \ + {(-sqrt(-y - 4),), (sqrt(-y - 4),)} + + +def _make_example_24609(): + D, R, H, B_g, V, D_c = symbols("D, R, H, B_g, V, D_c", real=True, positive=True) + Sigma_f, Sigma_a, nu = symbols("Sigma_f, Sigma_a, nu", real=True, positive=True) + x = symbols("x", real=True, positive=True) + eq = ( + 2**(S(2)/3)*pi**(S(2)/3)*D_c*(S(231361)/10000 + pi**2/x**2) + /(6*V**(S(2)/3)*x**(S(1)/3)) + - 2**(S(2)/3)*pi**(S(8)/3)*D_c/(2*V**(S(2)/3)*x**(S(7)/3)) + ) + expected = 100*sqrt(2)*pi/481 + return eq, expected, x + + +def test_issue_24609(): + # https://github.com/sympy/sympy/issues/24609 + eq, expected, x = _make_example_24609() + assert solve(eq, x, simplify=True) == [expected] + [solapprox] = solve(eq.n(), x) + assert abs(solapprox - expected.n()) < 1e-14 + + +@XFAIL +def test_issue_24609_xfail(): + # + # This returns 5 solutions when it should be 1 (with x positive). + # Simplification reveals all solutions to be equivalent. It is expected + # that solve without simplify=True returns duplicate solutions in some + # cases but the core of this equation is a simple quadratic that can easily + # be solved without introducing any redundant solutions: + # + # >>> print(factor_terms(eq.as_numer_denom()[0])) + # 2**(2/3)*pi**(2/3)*D_c*V**(2/3)*x**(7/3)*(231361*x**2 - 20000*pi**2) + # + eq, expected, x = _make_example_24609() + assert len(solve(eq, x)) == [expected] + # + # We do not want to pass this test just by using simplify so if the above + # passes then uncomment the additional test below: + # + # assert len(solve(eq, x, simplify=False)) == 1 + + +def test_polysys(): + assert set(solve([x**2 + 2/y - 2, x + y - 3], [x, y])) == \ + {(S.One, S(2)), (1 + sqrt(5), 2 - sqrt(5)), + (1 - sqrt(5), 2 + sqrt(5))} + assert solve([x**2 + y - 2, x**2 + y]) == [] + # the ordering should be whatever the user requested + assert solve([x**2 + y - 3, x - y - 4], (x, y)) != solve([x**2 + + y - 3, x - y - 4], (y, x)) + + +@slow +def test_unrad1(): + raises(NotImplementedError, lambda: + unrad(sqrt(x) + sqrt(x + 1) + sqrt(1 - sqrt(x)) + 3)) + raises(NotImplementedError, lambda: + unrad(sqrt(x) + (x + 1)**Rational(1, 3) + 2*sqrt(y))) + + s = symbols('s', cls=Dummy) + + # checkers to deal with possibility of answer coming + # back with a sign change (cf issue 5203) + def check(rv, ans): + assert bool(rv[1]) == bool(ans[1]) + if ans[1]: + return s_check(rv, ans) + e = rv[0].expand() + a = ans[0].expand() + return e in [a, -a] and rv[1] == ans[1] + + def s_check(rv, ans): + # get the dummy + rv = list(rv) + d = rv[0].atoms(Dummy) + reps = list(zip(d, [s]*len(d))) + # replace s with this dummy + rv = (rv[0].subs(reps).expand(), [rv[1][0].subs(reps), rv[1][1].subs(reps)]) + ans = (ans[0].subs(reps).expand(), [ans[1][0].subs(reps), ans[1][1].subs(reps)]) + return str(rv[0]) in [str(ans[0]), str(-ans[0])] and \ + str(rv[1]) == str(ans[1]) + + assert unrad(1) is None + assert check(unrad(sqrt(x)), + (x, [])) + assert check(unrad(sqrt(x) + 1), + (x - 1, [])) + assert check(unrad(sqrt(x) + root(x, 3) + 2), + (s**3 + s**2 + 2, [s, s**6 - x])) + assert check(unrad(sqrt(x)*root(x, 3) + 2), + (x**5 - 64, [])) + assert check(unrad(sqrt(x) + (x + 1)**Rational(1, 3)), + (x**3 - (x + 1)**2, [])) + assert check(unrad(sqrt(x) + sqrt(x + 1) + sqrt(2*x)), + (-2*sqrt(2)*x - 2*x + 1, [])) + assert check(unrad(sqrt(x) + sqrt(x + 1) + 2), + (16*x - 9, [])) + assert check(unrad(sqrt(x) + sqrt(x + 1) + sqrt(1 - x)), + (5*x**2 - 4*x, [])) + assert check(unrad(a*sqrt(x) + b*sqrt(x) + c*sqrt(y) + d*sqrt(y)), + ((a*sqrt(x) + b*sqrt(x))**2 - (c*sqrt(y) + d*sqrt(y))**2, [])) + assert check(unrad(sqrt(x) + sqrt(1 - x)), + (2*x - 1, [])) + assert check(unrad(sqrt(x) + sqrt(1 - x) - 3), + (x**2 - x + 16, [])) + assert check(unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x)), + (5*x**2 - 2*x + 1, [])) + assert unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x) - 3) in [ + (25*x**4 + 376*x**3 + 1256*x**2 - 2272*x + 784, []), + (25*x**8 - 476*x**6 + 2534*x**4 - 1468*x**2 + 169, [])] + assert unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x) - sqrt(1 - 2*x)) == \ + (41*x**4 + 40*x**3 + 232*x**2 - 160*x + 16, []) # orig root at 0.487 + assert check(unrad(sqrt(x) + sqrt(x + 1)), (S.One, [])) + + eq = sqrt(x) + sqrt(x + 1) + sqrt(1 - sqrt(x)) + assert check(unrad(eq), + (16*x**2 - 9*x, [])) + assert set(solve(eq, check=False)) == {S.Zero, Rational(9, 16)} + assert solve(eq) == [] + # but this one really does have those solutions + assert set(solve(sqrt(x) - sqrt(x + 1) + sqrt(1 - sqrt(x)))) == \ + {S.Zero, Rational(9, 16)} + + assert check(unrad(sqrt(x) + root(x + 1, 3) + 2*sqrt(y), y), + (S('2*sqrt(x)*(x + 1)**(1/3) + x - 4*y + (x + 1)**(2/3)'), [])) + assert check(unrad(sqrt(x/(1 - x)) + (x + 1)**Rational(1, 3)), + (x**5 - x**4 - x**3 + 2*x**2 + x - 1, [])) + assert check(unrad(sqrt(x/(1 - x)) + 2*sqrt(y), y), + (4*x*y + x - 4*y, [])) + assert check(unrad(sqrt(x)*sqrt(1 - x) + 2, x), + (x**2 - x + 4, [])) + + # http://tutorial.math.lamar.edu/ + # Classes/Alg/SolveRadicalEqns.aspx#Solve_Rad_Ex2_a + assert solve(Eq(x, sqrt(x + 6))) == [3] + assert solve(Eq(x + sqrt(x - 4), 4)) == [4] + assert solve(Eq(1, x + sqrt(2*x - 3))) == [] + assert set(solve(Eq(sqrt(5*x + 6) - 2, x))) == {-S.One, S(2)} + assert set(solve(Eq(sqrt(2*x - 1) - sqrt(x - 4), 2))) == {S(5), S(13)} + assert solve(Eq(sqrt(x + 7) + 2, sqrt(3 - x))) == [-6] + # http://www.purplemath.com/modules/solverad.htm + assert solve((2*x - 5)**Rational(1, 3) - 3) == [16] + assert set(solve(x + 1 - root(x**4 + 4*x**3 - x, 4))) == \ + {Rational(-1, 2), Rational(-1, 3)} + assert set(solve(sqrt(2*x**2 - 7) - (3 - x))) == {-S(8), S(2)} + assert solve(sqrt(2*x + 9) - sqrt(x + 1) - sqrt(x + 4)) == [0] + assert solve(sqrt(x + 4) + sqrt(2*x - 1) - 3*sqrt(x - 1)) == [5] + assert solve(sqrt(x)*sqrt(x - 7) - 12) == [16] + assert solve(sqrt(x - 3) + sqrt(x) - 3) == [4] + assert solve(sqrt(9*x**2 + 4) - (3*x + 2)) == [0] + assert solve(sqrt(x) - 2 - 5) == [49] + assert solve(sqrt(x - 3) - sqrt(x) - 3) == [] + assert solve(sqrt(x - 1) - x + 7) == [10] + assert solve(sqrt(x - 2) - 5) == [27] + assert solve(sqrt(17*x - sqrt(x**2 - 5)) - 7) == [3] + assert solve(sqrt(x) - sqrt(x - 1) + sqrt(sqrt(x))) == [] + + # don't posify the expression in unrad and do use _mexpand + z = sqrt(2*x + 1)/sqrt(x) - sqrt(2 + 1/x) + p = posify(z)[0] + assert solve(p) == [] + assert solve(z) == [] + assert solve(z + 6*I) == [Rational(-1, 11)] + assert solve(p + 6*I) == [] + # issue 8622 + assert unrad(root(x + 1, 5) - root(x, 3)) == ( + -(x**5 - x**3 - 3*x**2 - 3*x - 1), []) + # issue #8679 + assert check(unrad(x + root(x, 3) + root(x, 3)**2 + sqrt(y), x), + (s**3 + s**2 + s + sqrt(y), [s, s**3 - x])) + + # for coverage + assert check(unrad(sqrt(x) + root(x, 3) + y), + (s**3 + s**2 + y, [s, s**6 - x])) + assert solve(sqrt(x) + root(x, 3) - 2) == [1] + raises(NotImplementedError, lambda: + solve(sqrt(x) + root(x, 3) + root(x + 1, 5) - 2)) + # fails through a different code path + raises(NotImplementedError, lambda: solve(-sqrt(2) + cosh(x)/x)) + # unrad some + assert solve(sqrt(x + root(x, 3))+root(x - y, 5), y) == [ + x + (x**Rational(1, 3) + x)**Rational(5, 2)] + assert check(unrad(sqrt(x) - root(x + 1, 3)*sqrt(x + 2) + 2), + (s**10 + 8*s**8 + 24*s**6 - 12*s**5 - 22*s**4 - 160*s**3 - 212*s**2 - + 192*s - 56, [s, s**2 - x])) + e = root(x + 1, 3) + root(x, 3) + assert unrad(e) == (2*x + 1, []) + eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5) + assert check(unrad(eq), + (15625*x**4 + 173000*x**3 + 355600*x**2 - 817920*x + 331776, [])) + assert check(unrad(root(x, 4) + root(x, 4)**3 - 1), + (s**3 + s - 1, [s, s**4 - x])) + assert check(unrad(root(x, 2) + root(x, 2)**3 - 1), + (x**3 + 2*x**2 + x - 1, [])) + assert unrad(x**0.5) is None + assert check(unrad(t + root(x + y, 5) + root(x + y, 5)**3), + (s**3 + s + t, [s, s**5 - x - y])) + assert check(unrad(x + root(x + y, 5) + root(x + y, 5)**3, y), + (s**3 + s + x, [s, s**5 - x - y])) + assert check(unrad(x + root(x + y, 5) + root(x + y, 5)**3, x), + (s**5 + s**3 + s - y, [s, s**5 - x - y])) + assert check(unrad(root(x - 1, 3) + root(x + 1, 5) + root(2, 5)), + (s**5 + 5*2**Rational(1, 5)*s**4 + s**3 + 10*2**Rational(2, 5)*s**3 + + 10*2**Rational(3, 5)*s**2 + 5*2**Rational(4, 5)*s + 4, [s, s**3 - x + 1])) + raises(NotImplementedError, lambda: + unrad((root(x, 2) + root(x, 3) + root(x, 4)).subs(x, x**5 - x + 1))) + + # the simplify flag should be reset to False for unrad results; + # if it's not then this next test will take a long time + assert solve(root(x, 3) + root(x, 5) - 2) == [1] + eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5) + assert check(unrad(eq), + ((5*x - 4)*(3125*x**3 + 37100*x**2 + 100800*x - 82944), [])) + ans = S(''' + [4/5, -1484/375 + 172564/(140625*(114*sqrt(12657)/78125 + + 12459439/52734375)**(1/3)) + + 4*(114*sqrt(12657)/78125 + 12459439/52734375)**(1/3)]''') + assert solve(eq) == ans + # duplicate radical handling + assert check(unrad(sqrt(x + root(x + 1, 3)) - root(x + 1, 3) - 2), + (s**3 - s**2 - 3*s - 5, [s, s**3 - x - 1])) + # cov post-processing + e = root(x**2 + 1, 3) - root(x**2 - 1, 5) - 2 + assert check(unrad(e), + (s**5 - 10*s**4 + 39*s**3 - 80*s**2 + 80*s - 30, + [s, s**3 - x**2 - 1])) + + e = sqrt(x + root(x + 1, 2)) - root(x + 1, 3) - 2 + assert check(unrad(e), + (s**6 - 2*s**5 - 7*s**4 - 3*s**3 + 26*s**2 + 40*s + 25, + [s, s**3 - x - 1])) + assert check(unrad(e, _reverse=True), + (s**6 - 14*s**5 + 73*s**4 - 187*s**3 + 276*s**2 - 228*s + 89, + [s, s**2 - x - sqrt(x + 1)])) + # this one needs r0, r1 reversal to work + assert check(unrad(sqrt(x + sqrt(root(x, 3) - 1)) - root(x, 6) - 2), + (s**12 - 2*s**8 - 8*s**7 - 8*s**6 + s**4 + 8*s**3 + 23*s**2 + + 32*s + 17, [s, s**6 - x])) + + # why does this pass + assert unrad(root(cosh(x), 3)/x*root(x + 1, 5) - 1) == ( + -(x**15 - x**3*cosh(x)**5 - 3*x**2*cosh(x)**5 - 3*x*cosh(x)**5 + - cosh(x)**5), []) + # and this fail? + #assert unrad(sqrt(cosh(x)/x) + root(x + 1, 3)*sqrt(x) - 1) == ( + # -s**6 + 6*s**5 - 15*s**4 + 20*s**3 - 15*s**2 + 6*s + x**5 + + # 2*x**4 + x**3 - 1, [s, s**2 - cosh(x)/x]) + + # watch for symbols in exponents + assert unrad(S('(x+y)**(2*y/3) + (x+y)**(1/3) + 1')) is None + assert check(unrad(S('(x+y)**(2*y/3) + (x+y)**(1/3) + 1'), x), + (s**(2*y) + s + 1, [s, s**3 - x - y])) + # should _Q be so lenient? + assert unrad(x**(S.Half/y) + y, x) == (x**(1/y) - y**2, []) + + # This tests two things: that if full unrad is attempted and fails + # the solution should still be found; also it tests that the use of + # composite + assert len(solve(sqrt(y)*x + x**3 - 1, x)) == 3 + assert len(solve(-512*y**3 + 1344*(x + 2)**Rational(1, 3)*y**2 - + 1176*(x + 2)**Rational(2, 3)*y - 169*x + 686, y, _unrad=False)) == 3 + + # watch out for when the cov doesn't involve the symbol of interest + eq = S('-x + (7*y/8 - (27*x/2 + 27*sqrt(x**2)/2)**(1/3)/3)**3 - 1') + assert solve(eq, y) == [ + 2**(S(2)/3)*(27*x + 27*sqrt(x**2))**(S(1)/3)*S(4)/21 + (512*x/343 + + S(512)/343)**(S(1)/3)*(-S(1)/2 - sqrt(3)*I/2), 2**(S(2)/3)*(27*x + + 27*sqrt(x**2))**(S(1)/3)*S(4)/21 + (512*x/343 + + S(512)/343)**(S(1)/3)*(-S(1)/2 + sqrt(3)*I/2), 2**(S(2)/3)*(27*x + + 27*sqrt(x**2))**(S(1)/3)*S(4)/21 + (512*x/343 + S(512)/343)**(S(1)/3)] + + eq = root(x + 1, 3) - (root(x, 3) + root(x, 5)) + assert check(unrad(eq), + (3*s**13 + 3*s**11 + s**9 - 1, [s, s**15 - x])) + assert check(unrad(eq - 2), + (3*s**13 + 3*s**11 + 6*s**10 + s**9 + 12*s**8 + 6*s**6 + 12*s**5 + + 12*s**3 + 7, [s, s**15 - x])) + assert check(unrad(root(x, 3) - root(x + 1, 4)/2 + root(x + 2, 3)), + (s*(4096*s**9 + 960*s**8 + 48*s**7 - s**6 - 1728), + [s, s**4 - x - 1])) # orig expr has two real roots: -1, -.389 + assert check(unrad(root(x, 3) + root(x + 1, 4) - root(x + 2, 3)/2), + (343*s**13 + 2904*s**12 + 1344*s**11 + 512*s**10 - 1323*s**9 - + 3024*s**8 - 1728*s**7 + 1701*s**5 + 216*s**4 - 729*s, [s, s**4 - x - + 1])) # orig expr has one real root: -0.048 + assert check(unrad(root(x, 3)/2 - root(x + 1, 4) + root(x + 2, 3)), + (729*s**13 - 216*s**12 + 1728*s**11 - 512*s**10 + 1701*s**9 - + 3024*s**8 + 1344*s**7 + 1323*s**5 - 2904*s**4 + 343*s, [s, s**4 - x - + 1])) # orig expr has 2 real roots: -0.91, -0.15 + assert check(unrad(root(x, 3)/2 - root(x + 1, 4) + root(x + 2, 3) - 2), + (729*s**13 + 1242*s**12 + 18496*s**10 + 129701*s**9 + 388602*s**8 + + 453312*s**7 - 612864*s**6 - 3337173*s**5 - 6332418*s**4 - 7134912*s**3 + - 5064768*s**2 - 2111913*s - 398034, [s, s**4 - x - 1])) + # orig expr has 1 real root: 19.53 + + ans = solve(sqrt(x) + sqrt(x + 1) - + sqrt(1 - x) - sqrt(2 + x)) + assert len(ans) == 1 and NS(ans[0])[:4] == '0.73' + # the fence optimization problem + # https://github.com/sympy/sympy/issues/4793#issuecomment-36994519 + F = Symbol('F') + eq = F - (2*x + 2*y + sqrt(x**2 + y**2)) + ans = F*Rational(2, 7) - sqrt(2)*F/14 + X = solve(eq, x, check=False) + for xi in reversed(X): # reverse since currently, ans is the 2nd one + Y = solve((x*y).subs(x, xi).diff(y), y, simplify=False, check=False) + if any((a - ans).expand().is_zero for a in Y): + break + else: + assert None # no answer was found + assert solve(sqrt(x + 1) + root(x, 3) - 2) == S(''' + [(-11/(9*(47/54 + sqrt(93)/6)**(1/3)) + 1/3 + (47/54 + + sqrt(93)/6)**(1/3))**3]''') + assert solve(sqrt(sqrt(x + 1)) + x**Rational(1, 3) - 2) == S(''' + [(-sqrt(-2*(-1/16 + sqrt(6913)/16)**(1/3) + 6/(-1/16 + + sqrt(6913)/16)**(1/3) + 17/2 + 121/(4*sqrt(-6/(-1/16 + + sqrt(6913)/16)**(1/3) + 2*(-1/16 + sqrt(6913)/16)**(1/3) + 17/4)))/2 + + sqrt(-6/(-1/16 + sqrt(6913)/16)**(1/3) + 2*(-1/16 + + sqrt(6913)/16)**(1/3) + 17/4)/2 + 9/4)**3]''') + assert solve(sqrt(x) + root(sqrt(x) + 1, 3) - 2) == S(''' + [(-(81/2 + 3*sqrt(741)/2)**(1/3)/3 + (81/2 + 3*sqrt(741)/2)**(-1/3) + + 2)**2]''') + eq = S(''' + -x + (1/2 - sqrt(3)*I/2)*(3*x**3/2 - x*(3*x**2 - 34)/2 + sqrt((-3*x**3 + + x*(3*x**2 - 34) + 90)**2/4 - 39304/27) - 45)**(1/3) + 34/(3*(1/2 - + sqrt(3)*I/2)*(3*x**3/2 - x*(3*x**2 - 34)/2 + sqrt((-3*x**3 + x*(3*x**2 + - 34) + 90)**2/4 - 39304/27) - 45)**(1/3))''') + assert check(unrad(eq), + (s*-(-s**6 + sqrt(3)*s**6*I - 153*2**Rational(2, 3)*3**Rational(1, 3)*s**4 + + 51*12**Rational(1, 3)*s**4 - 102*2**Rational(2, 3)*3**Rational(5, 6)*s**4*I - 1620*s**3 + + 1620*sqrt(3)*s**3*I + 13872*18**Rational(1, 3)*s**2 - 471648 + + 471648*sqrt(3)*I), [s, s**3 - 306*x - sqrt(3)*sqrt(31212*x**2 - + 165240*x + 61484) + 810])) + + assert solve(eq) == [] # not other code errors + eq = root(x, 3) - root(y, 3) + root(x, 5) + assert check(unrad(eq), + (s**15 + 3*s**13 + 3*s**11 + s**9 - y, [s, s**15 - x])) + eq = root(x, 3) + root(y, 3) + root(x*y, 4) + assert check(unrad(eq), + (s*y*(-s**12 - 3*s**11*y - 3*s**10*y**2 - s**9*y**3 - + 3*s**8*y**2 + 21*s**7*y**3 - 3*s**6*y**4 - 3*s**4*y**4 - + 3*s**3*y**5 - y**6), [s, s**4 - x*y])) + raises(NotImplementedError, + lambda: unrad(root(x, 3) + root(y, 3) + root(x*y, 5))) + + # Test unrad with an Equality + eq = Eq(-x**(S(1)/5) + x**(S(1)/3), -3**(S(1)/3) - (-1)**(S(3)/5)*3**(S(1)/5)) + assert check(unrad(eq), + (-s**5 + s**3 - 3**(S(1)/3) - (-1)**(S(3)/5)*3**(S(1)/5), [s, s**15 - x])) + + # make sure buried radicals are exposed + s = sqrt(x) - 1 + assert unrad(s**2 - s**3) == (x**3 - 6*x**2 + 9*x - 4, []) + # make sure numerators which are already polynomial are rejected + assert unrad((x/(x + 1) + 3)**(-2), x) is None + + # https://github.com/sympy/sympy/issues/23707 + eq = sqrt(x - y)*exp(t*sqrt(x - y)) - exp(t*sqrt(x - y)) + assert solve(eq, y) == [x - 1] + assert unrad(eq) is None + + +@slow +def test_unrad_slow(): + # this has roots with multiplicity > 1; there should be no + # repeats in roots obtained, however + eq = (sqrt(1 + sqrt(1 - 4*x**2)) - x*(1 + sqrt(1 + 2*sqrt(1 - 4*x**2)))) + assert solve(eq) == [S.Half] + + +@XFAIL +def test_unrad_fail(): + # this only works if we check real_root(eq.subs(x, Rational(1, 3))) + # but checksol doesn't work like that + assert solve(root(x**3 - 3*x**2, 3) + 1 - x) == [Rational(1, 3)] + assert solve(root(x + 1, 3) + root(x**2 - 2, 5) + 1) == [ + -1, -1 + CRootOf(x**5 + x**4 + 5*x**3 + 8*x**2 + 10*x + 5, 0)**3] + + +def test_checksol(): + x, y, r, t = symbols('x, y, r, t') + eq = r - x**2 - y**2 + dict_var_soln = {y: - sqrt(r) / sqrt(tan(t)**2 + 1), + x: -sqrt(r)*tan(t)/sqrt(tan(t)**2 + 1)} + assert checksol(eq, dict_var_soln) == True + assert checksol(Eq(x, False), {x: False}) is True + assert checksol(Ne(x, False), {x: False}) is False + assert checksol(Eq(x < 1, True), {x: 0}) is True + assert checksol(Eq(x < 1, True), {x: 1}) is False + assert checksol(Eq(x < 1, False), {x: 1}) is True + assert checksol(Eq(x < 1, False), {x: 0}) is False + assert checksol(Eq(x + 1, x**2 + 1), {x: 1}) is True + assert checksol([x - 1, x**2 - 1], x, 1) is True + assert checksol([x - 1, x**2 - 2], x, 1) is False + assert checksol(Poly(x**2 - 1), x, 1) is True + assert checksol(0, {}) is True + assert checksol([1e-10, x - 2], x, 2) is False + assert checksol([0.5, 0, x], x, 0) is False + assert checksol(y, x, 2) is False + assert checksol(x+1e-10, x, 0, numerical=True) is True + assert checksol(x+1e-10, x, 0, numerical=False) is False + assert checksol(exp(92*x), {x: log(sqrt(2)/2)}) is False + assert checksol(exp(92*x), {x: log(sqrt(2)/2) + I*pi}) is False + assert checksol(1/x**5, x, 1000) is False + raises(ValueError, lambda: checksol(x, 1)) + raises(ValueError, lambda: checksol([], x, 1)) + + +def test__invert(): + assert _invert(x - 2) == (2, x) + assert _invert(2) == (2, 0) + assert _invert(exp(1/x) - 3, x) == (1/log(3), x) + assert _invert(exp(1/x + a/x) - 3, x) == ((a + 1)/log(3), x) + assert _invert(a, x) == (a, 0) + + +def test_issue_4463(): + assert solve(-a*x + 2*x*log(x), x) == [exp(a/2)] + assert solve(x**x) == [] + assert solve(x**x - 2) == [exp(LambertW(log(2)))] + assert solve(((x - 3)*(x - 2))**((x - 3)*(x - 4))) == [2] + +@slow +def test_issue_5114_solvers(): + a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r = symbols('a:r') + + # there is no 'a' in the equation set but this is how the + # problem was originally posed + syms = a, b, c, f, h, k, n + eqs = [b + r/d - c/d, + c*(1/d + 1/e + 1/g) - f/g - r/d, + f*(1/g + 1/i + 1/j) - c/g - h/i, + h*(1/i + 1/l + 1/m) - f/i - k/m, + k*(1/m + 1/o + 1/p) - h/m - n/p, + n*(1/p + 1/q) - k/p] + assert len(solve(eqs, syms, manual=True, check=False, simplify=False)) == 1 + + +def test_issue_5849(): + # + # XXX: This system does not have a solution for most values of the + # parameters. Generally solve returns the empty set for systems that are + # generically inconsistent. + # + I1, I2, I3, I4, I5, I6 = symbols('I1:7') + dI1, dI4, dQ2, dQ4, Q2, Q4 = symbols('dI1,dI4,dQ2,dQ4,Q2,Q4') + + e = ( + I1 - I2 - I3, + I3 - I4 - I5, + I4 + I5 - I6, + -I1 + I2 + I6, + -2*I1 - 2*I3 - 2*I5 - 3*I6 - dI1/2 + 12, + -I4 + dQ4, + -I2 + dQ2, + 2*I3 + 2*I5 + 3*I6 - Q2, + I4 - 2*I5 + 2*Q4 + dI4 + ) + + ans = [{ + I1: I2 + I3, + dI1: -4*I2 - 8*I3 - 4*I5 - 6*I6 + 24, + I4: I3 - I5, + dQ4: I3 - I5, + Q4: -I3/2 + 3*I5/2 - dI4/2, + dQ2: I2, + Q2: 2*I3 + 2*I5 + 3*I6}] + + v = I1, I4, Q2, Q4, dI1, dI4, dQ2, dQ4 + assert solve(e, *v, manual=True, check=False, dict=True) == ans + assert solve(e, *v, manual=True, check=False) == [ + tuple([a.get(i, i) for i in v]) for a in ans] + assert solve(e, *v, manual=True) == [] + assert solve(e, *v) == [] + + # the matrix solver (tested below) doesn't like this because it produces + # a zero row in the matrix. Is this related to issue 4551? + assert [ei.subs( + ans[0]) for ei in e] == [0, 0, I3 - I6, -I3 + I6, 0, 0, 0, 0, 0] + + +def test_issue_5849_matrix(): + '''Same as test_issue_5849 but solved with the matrix solver. + + A solution only exists if I3 == I6 which is not generically true, + but `solve` does not return conditions under which the solution is + valid, only a solution that is canonical and consistent with the input. + ''' + # a simple example with the same issue + # assert solve([x+y+z, x+y], [x, y]) == {x: y} + # the longer example + I1, I2, I3, I4, I5, I6 = symbols('I1:7') + dI1, dI4, dQ2, dQ4, Q2, Q4 = symbols('dI1,dI4,dQ2,dQ4,Q2,Q4') + + e = ( + I1 - I2 - I3, + I3 - I4 - I5, + I4 + I5 - I6, + -I1 + I2 + I6, + -2*I1 - 2*I3 - 2*I5 - 3*I6 - dI1/2 + 12, + -I4 + dQ4, + -I2 + dQ2, + 2*I3 + 2*I5 + 3*I6 - Q2, + I4 - 2*I5 + 2*Q4 + dI4 + ) + assert solve(e, I1, I4, Q2, Q4, dI1, dI4, dQ2, dQ4) == [] + + +def test_issue_21882(): + + a, b, c, d, f, g, k = unknowns = symbols('a, b, c, d, f, g, k') + + equations = [ + -k*a + b + 5*f/6 + 2*c/9 + 5*d/6 + 4*a/3, + -k*f + 4*f/3 + d/2, + -k*d + f/6 + d, + 13*b/18 + 13*c/18 + 13*a/18, + -k*c + b/2 + 20*c/9 + a, + -k*b + b + c/18 + a/6, + 5*b/3 + c/3 + a, + 2*b/3 + 2*c + 4*a/3, + -g, + ] + + answer = [ + {a: 0, f: 0, b: 0, d: 0, c: 0, g: 0}, + {a: 0, f: -d, b: 0, k: S(5)/6, c: 0, g: 0}, + {a: -2*c, f: 0, b: c, d: 0, k: S(13)/18, g: 0}] + # but not {a: 0, f: 0, b: 0, k: S(3)/2, c: 0, d: 0, g: 0} + # since this is already covered by the first solution + got = solve(equations, unknowns, dict=True) + assert got == answer, (got,answer) + + +def test_issue_5901(): + f, g, h = map(Function, 'fgh') + a = Symbol('a') + D = Derivative(f(x), x) + G = Derivative(g(a), a) + assert solve(f(x) + f(x).diff(x), f(x)) == \ + [-D] + assert solve(f(x) - 3, f(x)) == \ + [3] + assert solve(f(x) - 3*f(x).diff(x), f(x)) == \ + [3*D] + assert solve([f(x) - 3*f(x).diff(x)], f(x)) == \ + {f(x): 3*D} + assert solve([f(x) - 3*f(x).diff(x), f(x)**2 - y + 4], f(x), y) == \ + [(3*D, 9*D**2 + 4)] + assert solve(-f(a)**2*g(a)**2 + f(a)**2*h(a)**2 + g(a).diff(a), + h(a), g(a), set=True) == \ + ([h(a), g(a)], { + (-sqrt(f(a)**2*g(a)**2 - G)/f(a), g(a)), + (sqrt(f(a)**2*g(a)**2 - G)/f(a), g(a))}), solve(-f(a)**2*g(a)**2 + f(a)**2*h(a)**2 + g(a).diff(a), + h(a), g(a), set=True) + args = [[f(x).diff(x, 2)*(f(x) + g(x)), 2 - g(x)**2], f(x), g(x)] + assert solve(*args, set=True)[1] == \ + {(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))} + eqs = [f(x)**2 + g(x) - 2*f(x).diff(x), g(x)**2 - 4] + assert solve(eqs, f(x), g(x), set=True) == \ + ([f(x), g(x)], { + (-sqrt(2*D - 2), S(2)), + (sqrt(2*D - 2), S(2)), + (-sqrt(2*D + 2), -S(2)), + (sqrt(2*D + 2), -S(2))}) + + # the underlying problem was in solve_linear that was not masking off + # anything but a Mul or Add; it now raises an error if it gets anything + # but a symbol and solve handles the substitutions necessary so solve_linear + # won't make this error + raises( + ValueError, lambda: solve_linear(f(x) + f(x).diff(x), symbols=[f(x)])) + assert solve_linear(f(x) + f(x).diff(x), symbols=[x]) == \ + (f(x) + Derivative(f(x), x), 1) + assert solve_linear(f(x) + Integral(x, (x, y)), symbols=[x]) == \ + (f(x) + Integral(x, (x, y)), 1) + assert solve_linear(f(x) + Integral(x, (x, y)) + x, symbols=[x]) == \ + (x + f(x) + Integral(x, (x, y)), 1) + assert solve_linear(f(y) + Integral(x, (x, y)) + x, symbols=[x]) == \ + (x, -f(y) - Integral(x, (x, y))) + assert solve_linear(x - f(x)/a + (f(x) - 1)/a, symbols=[x]) == \ + (x, 1/a) + assert solve_linear(x + Derivative(2*x, x)) == \ + (x, -2) + assert solve_linear(x + Integral(x, y), symbols=[x]) == \ + (x, 0) + assert solve_linear(x + Integral(x, y) - 2, symbols=[x]) == \ + (x, 2/(y + 1)) + + assert set(solve(x + exp(x)**2, exp(x))) == \ + {-sqrt(-x), sqrt(-x)} + assert solve(x + exp(x), x, implicit=True) == \ + [-exp(x)] + assert solve(cos(x) - sin(x), x, implicit=True) == [] + assert solve(x - sin(x), x, implicit=True) == \ + [sin(x)] + assert solve(x**2 + x - 3, x, implicit=True) == \ + [-x**2 + 3] + assert solve(x**2 + x - 3, x**2, implicit=True) == \ + [-x + 3] + + +def test_issue_5912(): + assert set(solve(x**2 - x - 0.1, rational=True)) == \ + {S.Half + sqrt(35)/10, -sqrt(35)/10 + S.Half} + ans = solve(x**2 - x - 0.1, rational=False) + assert len(ans) == 2 and all(a.is_Number for a in ans) + ans = solve(x**2 - x - 0.1) + assert len(ans) == 2 and all(a.is_Number for a in ans) + + +def test_float_handling(): + def test(e1, e2): + return len(e1.atoms(Float)) == len(e2.atoms(Float)) + assert solve(x - 0.5, rational=True)[0].is_Rational + assert solve(x - 0.5, rational=False)[0].is_Float + assert solve(x - S.Half, rational=False)[0].is_Rational + assert solve(x - 0.5, rational=None)[0].is_Float + assert solve(x - S.Half, rational=None)[0].is_Rational + assert test(nfloat(1 + 2*x), 1.0 + 2.0*x) + for contain in [list, tuple, set]: + ans = nfloat(contain([1 + 2*x])) + assert type(ans) is contain and test(list(ans)[0], 1.0 + 2.0*x) + k, v = list(nfloat({2*x: [1 + 2*x]}).items())[0] + assert test(k, 2*x) and test(v[0], 1.0 + 2.0*x) + assert test(nfloat(cos(2*x)), cos(2.0*x)) + assert test(nfloat(3*x**2), 3.0*x**2) + assert test(nfloat(3*x**2, exponent=True), 3.0*x**2.0) + assert test(nfloat(exp(2*x)), exp(2.0*x)) + assert test(nfloat(x/3), x/3.0) + assert test(nfloat(x**4 + 2*x + cos(Rational(1, 3)) + 1), + x**4 + 2.0*x + 1.94495694631474) + # don't call nfloat if there is no solution + tot = 100 + c + z + t + assert solve(((.7 + c)/tot - .6, (.2 + z)/tot - .3, t/tot - .1)) == [] + + +def test_check_assumptions(): + x = symbols('x', positive=True) + assert solve(x**2 - 1) == [1] + + +def test_issue_6056(): + assert solve(tanh(x + 3)*tanh(x - 3) - 1) == [] + assert solve(tanh(x - 1)*tanh(x + 1) + 1) == \ + [I*pi*Rational(-3, 4), -I*pi/4, I*pi/4, I*pi*Rational(3, 4)] + assert solve((tanh(x + 3)*tanh(x - 3) + 1)**2) == \ + [I*pi*Rational(-3, 4), -I*pi/4, I*pi/4, I*pi*Rational(3, 4)] + + +def test_issue_5673(): + eq = -x + exp(exp(LambertW(log(x)))*LambertW(log(x))) + assert checksol(eq, x, 2) is True + assert checksol(eq, x, 2, numerical=False) is None + + +def test_exclude(): + R, C, Ri, Vout, V1, Vminus, Vplus, s = \ + symbols('R, C, Ri, Vout, V1, Vminus, Vplus, s') + Rf = symbols('Rf', positive=True) # to eliminate Rf = 0 soln + eqs = [C*V1*s + Vplus*(-2*C*s - 1/R), + Vminus*(-1/Ri - 1/Rf) + Vout/Rf, + C*Vplus*s + V1*(-C*s - 1/R) + Vout/R, + -Vminus + Vplus] + assert solve(eqs, exclude=s*C*R) == [ + { + Rf: Ri*(C*R*s + 1)**2/(C*R*s), + Vminus: Vplus, + V1: 2*Vplus + Vplus/(C*R*s), + Vout: C*R*Vplus*s + 3*Vplus + Vplus/(C*R*s)}, + { + Vplus: 0, + Vminus: 0, + V1: 0, + Vout: 0}, + ] + + # TODO: Investigate why currently solution [0] is preferred over [1]. + assert solve(eqs, exclude=[Vplus, s, C]) in [[{ + Vminus: Vplus, + V1: Vout/2 + Vplus/2 + sqrt((Vout - 5*Vplus)*(Vout - Vplus))/2, + R: (Vout - 3*Vplus - sqrt(Vout**2 - 6*Vout*Vplus + 5*Vplus**2))/(2*C*Vplus*s), + Rf: Ri*(Vout - Vplus)/Vplus, + }, { + Vminus: Vplus, + V1: Vout/2 + Vplus/2 - sqrt((Vout - 5*Vplus)*(Vout - Vplus))/2, + R: (Vout - 3*Vplus + sqrt(Vout**2 - 6*Vout*Vplus + 5*Vplus**2))/(2*C*Vplus*s), + Rf: Ri*(Vout - Vplus)/Vplus, + }], [{ + Vminus: Vplus, + Vout: (V1**2 - V1*Vplus - Vplus**2)/(V1 - 2*Vplus), + Rf: Ri*(V1 - Vplus)**2/(Vplus*(V1 - 2*Vplus)), + R: Vplus/(C*s*(V1 - 2*Vplus)), + }]] + + +def test_high_order_roots(): + s = x**5 + 4*x**3 + 3*x**2 + Rational(7, 4) + assert set(solve(s)) == set(Poly(s*4, domain='ZZ').all_roots()) + + +def test_minsolve_linear_system(): + pqt = {"quick": True, "particular": True} + pqf = {"quick": False, "particular": True} + assert solve([x + y - 5, 2*x - y - 1], **pqt) == {x: 2, y: 3} + assert solve([x + y - 5, 2*x - y - 1], **pqf) == {x: 2, y: 3} + def count(dic): + return len([x for x in dic.values() if x == 0]) + assert count(solve([x + y + z, y + z + a + t], **pqt)) == 3 + assert count(solve([x + y + z, y + z + a + t], **pqf)) == 3 + assert count(solve([x + y + z, y + z + a], **pqt)) == 1 + assert count(solve([x + y + z, y + z + a], **pqf)) == 2 + # issue 22718 + A = Matrix([ + [ 1, 1, 1, 0, 1, 1, 0, 1, 0, 0, 1, 1, 1, 0], + [ 1, 1, 0, 1, 1, 0, 1, 0, 1, 0, -1, -1, 0, 0], + [-1, -1, 0, 0, -1, 0, 0, 0, 0, 0, 1, 1, 0, 1], + [ 1, 0, 1, 1, 0, 1, 1, 0, 0, 1, -1, 0, -1, 0], + [-1, 0, -1, 0, 0, -1, 0, 0, 0, 0, 1, 0, 1, 1], + [-1, 0, 0, -1, 0, 0, -1, 0, 0, 0, -1, 0, 0, -1], + [ 0, 1, 1, 1, 0, 0, 0, 1, 1, 1, 0, -1, -1, 0], + [ 0, -1, -1, 0, 0, 0, 0, -1, 0, 0, 0, 1, 1, 1], + [ 0, -1, 0, -1, 0, 0, 0, 0, -1, 0, 0, -1, 0, -1], + [ 0, 0, -1, -1, 0, 0, 0, 0, 0, -1, 0, 0, -1, -1], + [ 0, 0, 0, 0, 1, 1, 1, 1, 1, 1, 0, 0, 0, 0], + [ 0, 0, 0, 0, -1, -1, 0, -1, 0, 0, 0, 0, 0, 0]]) + v = Matrix(symbols("v:14", integer=True)) + B = Matrix([[2], [-2], [0], [0], [0], [0], [0], [0], [0], + [0], [0], [0]]) + eqs = A@v-B + assert solve(eqs) == [] + assert solve(eqs, particular=True) == [] # assumption violated + assert all(v for v in solve([x + y + z, y + z + a]).values()) + for _q in (True, False): + assert not all(v for v in solve( + [x + y + z, y + z + a], quick=_q, + particular=True).values()) + # raise error if quick used w/o particular=True + raises(ValueError, lambda: solve([x + 1], quick=_q)) + raises(ValueError, lambda: solve([x + 1], quick=_q, particular=False)) + # and give a good error message if someone tries to use + # particular with a single equation + raises(ValueError, lambda: solve(x + 1, particular=True)) + + +def test_real_roots(): + # cf. issue 6650 + x = Symbol('x', real=True) + assert len(solve(x**5 + x**3 + 1)) == 1 + + +def test_issue_6528(): + eqs = [ + 327600995*x**2 - 37869137*x + 1809975124*y**2 - 9998905626, + 895613949*x**2 - 273830224*x*y + 530506983*y**2 - 10000000000] + # two expressions encountered are > 1400 ops long so if this hangs + # it is likely because simplification is being done + assert len(solve(eqs, y, x, check=False)) == 4 + + +def test_overdetermined(): + x = symbols('x', real=True) + eqs = [Abs(4*x - 7) - 5, Abs(3 - 8*x) - 1] + assert solve(eqs, x) == [(S.Half,)] + assert solve(eqs, x, manual=True) == [(S.Half,)] + assert solve(eqs, x, manual=True, check=False) == [(S.Half,), (S(3),)] + + +def test_issue_6605(): + x = symbols('x') + assert solve(4**(x/2) - 2**(x/3)) == [0, 3*I*pi/log(2)] + # while the first one passed, this one failed + x = symbols('x', real=True) + assert solve(5**(x/2) - 2**(x/3)) == [0] + b = sqrt(6)*sqrt(log(2))/sqrt(log(5)) + assert solve(5**(x/2) - 2**(3/x)) == [-b, b] + + +def test__ispow(): + assert _ispow(x**2) + assert not _ispow(x) + assert not _ispow(True) + + +def test_issue_6644(): + eq = -sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) + sqrt((-m**2/2 - sqrt( + 4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m - sqrt( + 4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2) + sol = solve(eq, q, simplify=False, check=False) + assert len(sol) == 5 + + +def test_issue_6752(): + assert solve([a**2 + a, a - b], [a, b]) == [(-1, -1), (0, 0)] + assert solve([a**2 + a*c, a - b], [a, b]) == [(0, 0), (-c, -c)] + + +def test_issue_6792(): + assert solve(x*(x - 1)**2*(x + 1)*(x**6 - x + 1)) == [ + -1, 0, 1, CRootOf(x**6 - x + 1, 0), CRootOf(x**6 - x + 1, 1), + CRootOf(x**6 - x + 1, 2), CRootOf(x**6 - x + 1, 3), + CRootOf(x**6 - x + 1, 4), CRootOf(x**6 - x + 1, 5)] + + +def test_issues_6819_6820_6821_6248_8692_25777_25779(): + # issue 6821 + x, y = symbols('x y', real=True) + assert solve(abs(x + 3) - 2*abs(x - 3)) == [1, 9] + assert solve([abs(x) - 2, arg(x) - pi], x) == [(-2,)] + assert set(solve(abs(x - 7) - 8)) == {-S.One, S(15)} + + # issue 8692 + assert solve(Eq(Abs(x + 1) + Abs(x**2 - 7), 9), x) == [ + Rational(-1, 2) + sqrt(61)/2, -sqrt(69)/2 + S.Half] + + # issue 7145 + assert solve(2*abs(x) - abs(x - 1)) == [-1, Rational(1, 3)] + + # 25777 + assert solve(abs(x**3 + x + 2)/(x + 1)) == [] + + # 25779 + assert solve(abs(x)) == [0] + assert solve(Eq(abs(x**2 - 2*x), 4), x) == [ + 1 - sqrt(5), 1 + sqrt(5)] + nn = symbols('nn', nonnegative=True) + assert solve(abs(sqrt(nn))) == [0] + nz = symbols('nz', nonzero=True) + assert solve(Eq(Abs(4 + 1 / (4*nz)), 0)) == [-Rational(1, 16)] + + x = symbols('x') + assert solve([re(x) - 1, im(x) - 2], x) == [ + {x: 1 + 2*I, re(x): 1, im(x): 2}] + + # check for 'dict' handling of solution + eq = sqrt(re(x)**2 + im(x)**2) - 3 + assert solve(eq) == solve(eq, x) + + i = symbols('i', imaginary=True) + assert solve(abs(i) - 3) == [-3*I, 3*I] + raises(NotImplementedError, lambda: solve(abs(x) - 3)) + + w = symbols('w', integer=True) + assert solve(2*x**w - 4*y**w, w) == solve((x/y)**w - 2, w) + + x, y = symbols('x y', real=True) + assert solve(x + y*I + 3) == {y: 0, x: -3} + # issue 2642 + assert solve(x*(1 + I)) == [0] + + x, y = symbols('x y', imaginary=True) + assert solve(x + y*I + 3 + 2*I) == {x: -2*I, y: 3*I} + + x = symbols('x', real=True) + assert solve(x + y + 3 + 2*I) == {x: -3, y: -2*I} + + # issue 6248 + f = Function('f') + assert solve(f(x + 1) - f(2*x - 1)) == [2] + assert solve(log(x + 1) - log(2*x - 1)) == [2] + + x = symbols('x') + assert solve(2**x + 4**x) == [I*pi/log(2)] + +def test_issue_17638(): + + assert solve(((2-exp(2*x))*exp(x))/(exp(2*x)+2)**2 > 0, x) == (-oo < x) & (x < log(2)/2) + assert solve(((2-exp(2*x)+2)*exp(x+2))/(exp(x)+2)**2 > 0, x) == (-oo < x) & (x < log(4)/2) + assert solve((exp(x)+2+x**2)*exp(2*x+2)/(exp(x)+2)**2 > 0, x) == (-oo < x) & (x < oo) + + + +def test_issue_14607(): + # issue 14607 + s, tau_c, tau_1, tau_2, phi, K = symbols( + 's, tau_c, tau_1, tau_2, phi, K') + + target = (s**2*tau_1*tau_2 + s*tau_1 + s*tau_2 + 1)/(K*s*(-phi + tau_c)) + + K_C, tau_I, tau_D = symbols('K_C, tau_I, tau_D', + positive=True, nonzero=True) + PID = K_C*(1 + 1/(tau_I*s) + tau_D*s) + + eq = (target - PID).together() + eq *= denom(eq).simplify() + eq = Poly(eq, s) + c = eq.coeffs() + + vars = [K_C, tau_I, tau_D] + s = solve(c, vars, dict=True) + + assert len(s) == 1 + + knownsolution = {K_C: -(tau_1 + tau_2)/(K*(phi - tau_c)), + tau_I: tau_1 + tau_2, + tau_D: tau_1*tau_2/(tau_1 + tau_2)} + + for var in vars: + assert s[0][var].simplify() == knownsolution[var].simplify() + + +def test_lambert_multivariate(): + from sympy.abc import x, y + assert _filtered_gens(Poly(x + 1/x + exp(x) + y), x) == {x, exp(x)} + assert _lambert(x, x) == [] + assert solve((x**2 - 2*x + 1).subs(x, log(x) + 3*x)) == [LambertW(3*S.Exp1)/3] + assert solve((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1)) == \ + [LambertW(3*exp(-sqrt(2)))/3, LambertW(3*exp(sqrt(2)))/3] + assert solve((x**2 - 2*x - 2).subs(x, log(x) + 3*x)) == \ + [LambertW(3*exp(1 - sqrt(3)))/3, LambertW(3*exp(1 + sqrt(3)))/3] + eq = (x*exp(x) - 3).subs(x, x*exp(x)) + assert solve(eq) == [LambertW(3*exp(-LambertW(3)))] + # coverage test + raises(NotImplementedError, lambda: solve(x - sin(x)*log(y - x), x)) + ans = [3, -3*LambertW(-log(3)/3)/log(3)] # 3 and 2.478... + assert solve(x**3 - 3**x, x) == ans + assert set(solve(3*log(x) - x*log(3))) == set(ans) + assert solve(LambertW(2*x) - y, x) == [y*exp(y)/2] + + +@XFAIL +def test_other_lambert(): + assert solve(3*sin(x) - x*sin(3), x) == [3] + assert set(solve(x**a - a**x), x) == { + a, -a*LambertW(-log(a)/a)/log(a)} + + +@slow +def test_lambert_bivariate(): + # tests passing current implementation + assert solve((x**2 + x)*exp(x**2 + x) - 1) == [ + Rational(-1, 2) + sqrt(1 + 4*LambertW(1))/2, + Rational(-1, 2) - sqrt(1 + 4*LambertW(1))/2] + assert solve((x**2 + x)*exp((x**2 + x)*2) - 1) == [ + Rational(-1, 2) + sqrt(1 + 2*LambertW(2))/2, + Rational(-1, 2) - sqrt(1 + 2*LambertW(2))/2] + assert solve(a/x + exp(x/2), x) == [2*LambertW(-a/2)] + assert solve((a/x + exp(x/2)).diff(x), x) == \ + [4*LambertW(-sqrt(2)*sqrt(a)/4), 4*LambertW(sqrt(2)*sqrt(a)/4)] + assert solve((1/x + exp(x/2)).diff(x), x) == \ + [4*LambertW(-sqrt(2)/4), + 4*LambertW(sqrt(2)/4), # nsimplifies as 2*2**(141/299)*3**(206/299)*5**(205/299)*7**(37/299)/21 + 4*LambertW(-sqrt(2)/4, -1)] + assert solve(x*log(x) + 3*x + 1, x) == \ + [exp(-3 + LambertW(-exp(3)))] + assert solve(-x**2 + 2**x, x) == [2, 4, -2*LambertW(log(2)/2)/log(2)] + assert solve(x**2 - 2**x, x) == [2, 4, -2*LambertW(log(2)/2)/log(2)] + ans = solve(3*x + 5 + 2**(-5*x + 3), x) + assert len(ans) == 1 and ans[0].expand() == \ + Rational(-5, 3) + LambertW(-10240*root(2, 3)*log(2)/3)/(5*log(2)) + assert solve(5*x - 1 + 3*exp(2 - 7*x), x) == \ + [Rational(1, 5) + LambertW(-21*exp(Rational(3, 5))/5)/7] + assert solve((log(x) + x).subs(x, x**2 + 1)) == [ + -I*sqrt(-LambertW(1) + 1), sqrt(-1 + LambertW(1))] + # check collection + ax = a**(3*x + 5) + ans = solve(3*log(ax) + b*log(ax) + ax, x) + x0 = 1/log(a) + x1 = sqrt(3)*I + x2 = b + 3 + x3 = x2*LambertW(1/x2)/a**5 + x4 = x3**Rational(1, 3)/2 + assert ans == [ + x0*log(x4*(-x1 - 1)), + x0*log(x4*(x1 - 1)), + x0*log(x3)/3] + x1 = LambertW(Rational(1, 3)) + x2 = a**(-5) + x3 = -3**Rational(1, 3) + x4 = 3**Rational(5, 6)*I + x5 = x1**Rational(1, 3)*x2**Rational(1, 3)/2 + ans = solve(3*log(ax) + ax, x) + assert ans == [ + x0*log(3*x1*x2)/3, + x0*log(x5*(x3 - x4)), + x0*log(x5*(x3 + x4))] + # coverage + p = symbols('p', positive=True) + eq = 4*2**(2*p + 3) - 2*p - 3 + assert _solve_lambert(eq, p, _filtered_gens(Poly(eq), p)) == [ + Rational(-3, 2) - LambertW(-4*log(2))/(2*log(2))] + assert set(solve(3**cos(x) - cos(x)**3)) == { + acos(3), acos(-3*LambertW(-log(3)/3)/log(3))} + # should give only one solution after using `uniq` + assert solve(2*log(x) - 2*log(z) + log(z + log(x) + log(z)), x) == [ + exp(-z + LambertW(2*z**4*exp(2*z))/2)/z] + # cases when p != S.One + # issue 4271 + ans = solve((a/x + exp(x/2)).diff(x, 2), x) + x0 = (-a)**Rational(1, 3) + x1 = sqrt(3)*I + x2 = x0/6 + assert ans == [ + 6*LambertW(x0/3), + 6*LambertW(x2*(-x1 - 1)), + 6*LambertW(x2*(x1 - 1))] + assert solve((1/x + exp(x/2)).diff(x, 2), x) == \ + [6*LambertW(Rational(-1, 3)), 6*LambertW(Rational(1, 6) - sqrt(3)*I/6), \ + 6*LambertW(Rational(1, 6) + sqrt(3)*I/6), 6*LambertW(Rational(-1, 3), -1)] + assert solve(x**2 - y**2/exp(x), x, y, dict=True) == \ + [{x: 2*LambertW(-y/2)}, {x: 2*LambertW(y/2)}] + # this is slow but not exceedingly slow + assert solve((x**3)**(x/2) + pi/2, x) == [ + exp(LambertW(-2*log(2)/3 + 2*log(pi)/3 + I*pi*Rational(2, 3)))] + + # issue 23253 + assert solve((1/log(sqrt(x) + 2)**2 - 1/x)) == [ + (LambertW(-exp(-2), -1) + 2)**2] + assert solve((1/log(1/sqrt(x) + 2)**2 - x)) == [ + (LambertW(-exp(-2), -1) + 2)**-2] + assert solve((1/log(x**2 + 2)**2 - x**-4)) == [ + -I*sqrt(2 - LambertW(exp(2))), + -I*sqrt(LambertW(-exp(-2)) + 2), + sqrt(-2 - LambertW(-exp(-2))), + sqrt(-2 + LambertW(exp(2))), + -sqrt(-2 - LambertW(-exp(-2), -1)), + sqrt(-2 - LambertW(-exp(-2), -1))] + + +def test_rewrite_trig(): + assert solve(sin(x) + tan(x)) == [0, -pi, pi, 2*pi] + assert solve(sin(x) + sec(x)) == [ + -2*atan(Rational(-1, 2) + sqrt(2)*sqrt(1 - sqrt(3)*I)/2 + sqrt(3)*I/2), + 2*atan(S.Half - sqrt(2)*sqrt(1 + sqrt(3)*I)/2 + sqrt(3)*I/2), 2*atan(S.Half + + sqrt(2)*sqrt(1 + sqrt(3)*I)/2 + sqrt(3)*I/2), 2*atan(S.Half - + sqrt(3)*I/2 + sqrt(2)*sqrt(1 - sqrt(3)*I)/2)] + assert solve(sinh(x) + tanh(x)) == [0, I*pi] + + # issue 6157 + assert solve(2*sin(x) - cos(x), x) == [atan(S.Half)] + + +@XFAIL +def test_rewrite_trigh(): + # if this import passes then the test below should also pass + from sympy.functions.elementary.hyperbolic import sech + assert solve(sinh(x) + sech(x)) == [ + 2*atanh(Rational(-1, 2) + sqrt(5)/2 - sqrt(-2*sqrt(5) + 2)/2), + 2*atanh(Rational(-1, 2) + sqrt(5)/2 + sqrt(-2*sqrt(5) + 2)/2), + 2*atanh(-sqrt(5)/2 - S.Half + sqrt(2 + 2*sqrt(5))/2), + 2*atanh(-sqrt(2 + 2*sqrt(5))/2 - sqrt(5)/2 - S.Half)] + + +def test_uselogcombine(): + eq = z - log(x) + log(y/(x*(-1 + y**2/x**2))) + assert solve(eq, x, force=True) == [-sqrt(y*(y - exp(z))), sqrt(y*(y - exp(z)))] + assert solve(log(x + 3) + log(1 + 3/x) - 3) in [ + [-3 + sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 + exp(3)/2, + -sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 - 3 + exp(3)/2], + [-3 + sqrt(-36 + (-exp(3) + 6)**2)/2 + exp(3)/2, + -3 - sqrt(-36 + (-exp(3) + 6)**2)/2 + exp(3)/2], + ] + assert solve(log(exp(2*x) + 1) + log(-tanh(x) + 1) - log(2)) == [] + + +def test_atan2(): + assert solve(atan2(x, 2) - pi/3, x) == [2*sqrt(3)] + + +def test_errorinverses(): + assert solve(erf(x) - y, x) == [erfinv(y)] + assert solve(erfinv(x) - y, x) == [erf(y)] + assert solve(erfc(x) - y, x) == [erfcinv(y)] + assert solve(erfcinv(x) - y, x) == [erfc(y)] + + +def test_issue_2725(): + R = Symbol('R') + eq = sqrt(2)*R*sqrt(1/(R + 1)) + (R + 1)*(sqrt(2)*sqrt(1/(R + 1)) - 1) + sol = solve(eq, R, set=True)[1] + assert sol == {(Rational(5, 3) + (Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + + sqrt(111)*I/9)**Rational(1, 3) + 40/(9*((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + + sqrt(111)*I/9)**Rational(1, 3))),), (Rational(5, 3) + 40/(9*(Rational(251, 27) + + sqrt(111)*I/9)**Rational(1, 3)) + (Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3),)} + + +def test_issue_5114_6611(): + # See that it doesn't hang; this solves in about 2 seconds. + # Also check that the solution is relatively small. + # Note: the system in issue 6611 solves in about 5 seconds and has + # an op-count of 138336 (with simplify=False). + b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r = symbols('b:r') + eqs = Matrix([ + [b - c/d + r/d], [c*(1/g + 1/e + 1/d) - f/g - r/d], + [-c/g + f*(1/j + 1/i + 1/g) - h/i], [-f/i + h*(1/m + 1/l + 1/i) - k/m], + [-h/m + k*(1/p + 1/o + 1/m) - n/p], [-k/p + n*(1/q + 1/p)]]) + v = Matrix([f, h, k, n, b, c]) + ans = solve(list(eqs), list(v), simplify=False) + # If time is taken to simplify then then 2617 below becomes + # 1168 and the time is about 50 seconds instead of 2. + assert sum(s.count_ops() for s in ans.values()) <= 3270 + + +def test_det_quick(): + m = Matrix(3, 3, symbols('a:9')) + assert m.det() == det_quick(m) # calls det_perm + m[0, 0] = 1 + assert m.det() == det_quick(m) # calls det_minor + m = Matrix(3, 3, list(range(9))) + assert m.det() == det_quick(m) # defaults to .det() + # make sure they work with Sparse + s = SparseMatrix(2, 2, (1, 2, 1, 4)) + assert det_perm(s) == det_minor(s) == s.det() + + +def test_real_imag_splitting(): + a, b = symbols('a b', real=True) + assert solve(sqrt(a**2 + b**2) - 3, a) == \ + [-sqrt(-b**2 + 9), sqrt(-b**2 + 9)] + a, b = symbols('a b', imaginary=True) + assert solve(sqrt(a**2 + b**2) - 3, a) == [] + + +def test_issue_7110(): + y = -2*x**3 + 4*x**2 - 2*x + 5 + assert any(ask(Q.real(i)) for i in solve(y)) + + +def test_units(): + assert solve(1/x - 1/(2*cm)) == [2*cm] + + +def test_issue_7547(): + A, B, V = symbols('A,B,V') + eq1 = Eq(630.26*(V - 39.0)*V*(V + 39) - A + B, 0) + eq2 = Eq(B, 1.36*10**8*(V - 39)) + eq3 = Eq(A, 5.75*10**5*V*(V + 39.0)) + sol = Matrix(nsolve(Tuple(eq1, eq2, eq3), [A, B, V], (0, 0, 0))) + assert str(sol) == str(Matrix( + [['4442890172.68209'], + ['4289299466.1432'], + ['70.5389666628177']])) + + +def test_issue_7895(): + r = symbols('r', real=True) + assert solve(sqrt(r) - 2) == [4] + + +def test_issue_2777(): + # the equations represent two circles + x, y = symbols('x y', real=True) + e1, e2 = sqrt(x**2 + y**2) - 10, sqrt(y**2 + (-x + 10)**2) - 3 + a, b = Rational(191, 20), 3*sqrt(391)/20 + ans = [(a, -b), (a, b)] + assert solve((e1, e2), (x, y)) == ans + assert solve((e1, e2/(x - a)), (x, y)) == [] + # make the 2nd circle's radius be -3 + e2 += 6 + assert solve((e1, e2), (x, y)) == [] + assert solve((e1, e2), (x, y), check=False) == ans + + +def test_issue_7322(): + number = 5.62527e-35 + assert solve(x - number, x)[0] == number + + +def test_nsolve(): + raises(ValueError, lambda: nsolve(x, (-1, 1), method='bisect')) + raises(TypeError, lambda: nsolve((x - y + 3,x + y,z - y),(x,y,z),(-50,50))) + raises(TypeError, lambda: nsolve((x + y, x - y), (0, 1))) + raises(TypeError, lambda: nsolve(x < 0.5, x, 1)) + + +@slow +def test_high_order_multivariate(): + assert len(solve(a*x**3 - x + 1, x)) == 3 + assert len(solve(a*x**4 - x + 1, x)) == 4 + assert solve(a*x**5 - x + 1, x) == [] # incomplete solution allowed + raises(NotImplementedError, lambda: + solve(a*x**5 - x + 1, x, incomplete=False)) + + # result checking must always consider the denominator and CRootOf + # must be checked, too + d = x**5 - x + 1 + assert solve(d*(1 + 1/d)) == [CRootOf(d + 1, i) for i in range(5)] + d = x - 1 + assert solve(d*(2 + 1/d)) == [S.Half] + + +def test_base_0_exp_0(): + assert solve(0**x - 1) == [0] + assert solve(0**(x - 2) - 1) == [2] + assert solve(S('x*(1/x**0 - x)', evaluate=False)) == \ + [0, 1] + + +def test__simple_dens(): + assert _simple_dens(1/x**0, [x]) == set() + assert _simple_dens(1/x**y, [x]) == {x**y} + assert _simple_dens(1/root(x, 3), [x]) == {x} + + +def test_issue_8755(): + # This tests two things: that if full unrad is attempted and fails + # the solution should still be found; also it tests the use of + # keyword `composite`. + assert len(solve(sqrt(y)*x + x**3 - 1, x)) == 3 + assert len(solve(-512*y**3 + 1344*(x + 2)**Rational(1, 3)*y**2 - + 1176*(x + 2)**Rational(2, 3)*y - 169*x + 686, y, _unrad=False)) == 3 + + +@slow +def test_issue_8828(): + x1 = 0 + y1 = -620 + r1 = 920 + x2 = 126 + y2 = 276 + x3 = 51 + y3 = 205 + r3 = 104 + v = x, y, z + + f1 = (x - x1)**2 + (y - y1)**2 - (r1 - z)**2 + f2 = (x - x2)**2 + (y - y2)**2 - z**2 + f3 = (x - x3)**2 + (y - y3)**2 - (r3 - z)**2 + F = f1,f2,f3 + + g1 = sqrt((x - x1)**2 + (y - y1)**2) + z - r1 + g2 = f2 + g3 = sqrt((x - x3)**2 + (y - y3)**2) + z - r3 + G = g1,g2,g3 + + A = solve(F, v) + B = solve(G, v) + C = solve(G, v, manual=True) + + p, q, r = [{tuple(i.evalf(2) for i in j) for j in R} for R in [A, B, C]] + assert p == q == r + + +def test_issue_2840_8155(): + # with parameter-free solutions (i.e. no `n`), we want to avoid + # excessive periodic solutions + assert solve(sin(3*x) + sin(6*x)) == [0, -2*pi/9, 2*pi/9] + assert solve(sin(300*x) + sin(600*x)) == [0, -pi/450, pi/450] + assert solve(2*sin(x) - 2*sin(2*x)) == [0, -pi/3, pi/3] + + +def test_issue_9567(): + assert solve(1 + 1/(x - 1)) == [0] + + +def test_issue_11538(): + assert solve(x + E) == [-E] + assert solve(x**2 + E) == [-I*sqrt(E), I*sqrt(E)] + assert solve(x**3 + 2*E) == [ + -cbrt(2 * E), + cbrt(2)*cbrt(E)/2 - cbrt(2)*sqrt(3)*I*cbrt(E)/2, + cbrt(2)*cbrt(E)/2 + cbrt(2)*sqrt(3)*I*cbrt(E)/2] + assert solve([x + 4, y + E], x, y) == {x: -4, y: -E} + assert solve([x**2 + 4, y + E], x, y) == [ + (-2*I, -E), (2*I, -E)] + + e1 = x - y**3 + 4 + e2 = x + y + 4 + 4 * E + assert len(solve([e1, e2], x, y)) == 3 + + +@slow +def test_issue_12114(): + a, b, c, d, e, f, g = symbols('a,b,c,d,e,f,g') + terms = [1 + a*b + d*e, 1 + a*c + d*f, 1 + b*c + e*f, + g - a**2 - d**2, g - b**2 - e**2, g - c**2 - f**2] + sol = solve(terms, [a, b, c, d, e, f, g], dict=True) + s = sqrt(-f**2 - 1) + s2 = sqrt(2 - f**2) + s3 = sqrt(6 - 3*f**2) + s4 = sqrt(3)*f + s5 = sqrt(3)*s2 + assert sol == [ + {a: -s, b: -s, c: -s, d: f, e: f, g: -1}, + {a: s, b: s, c: s, d: f, e: f, g: -1}, + {a: -s4/2 - s2/2, b: s4/2 - s2/2, c: s2, + d: -f/2 + s3/2, e: -f/2 - s5/2, g: 2}, + {a: -s4/2 + s2/2, b: s4/2 + s2/2, c: -s2, + d: -f/2 - s3/2, e: -f/2 + s5/2, g: 2}, + {a: s4/2 - s2/2, b: -s4/2 - s2/2, c: s2, + d: -f/2 - s3/2, e: -f/2 + s5/2, g: 2}, + {a: s4/2 + s2/2, b: -s4/2 + s2/2, c: -s2, + d: -f/2 + s3/2, e: -f/2 - s5/2, g: 2}] + + +def test_inf(): + assert solve(1 - oo*x) == [] + assert solve(oo*x, x) == [] + assert solve(oo*x - oo, x) == [] + + +def test_issue_12448(): + f = Function('f') + fun = [f(i) for i in range(15)] + sym = symbols('x:15') + reps = dict(zip(fun, sym)) + + (x, y, z), c = sym[:3], sym[3:] + ssym = solve([c[4*i]*x + c[4*i + 1]*y + c[4*i + 2]*z + c[4*i + 3] + for i in range(3)], (x, y, z)) + + (x, y, z), c = fun[:3], fun[3:] + sfun = solve([c[4*i]*x + c[4*i + 1]*y + c[4*i + 2]*z + c[4*i + 3] + for i in range(3)], (x, y, z)) + + assert sfun[fun[0]].xreplace(reps).count_ops() == \ + ssym[sym[0]].count_ops() + + +def test_denoms(): + assert denoms(x/2 + 1/y) == {2, y} + assert denoms(x/2 + 1/y, y) == {y} + assert denoms(x/2 + 1/y, [y]) == {y} + assert denoms(1/x + 1/y + 1/z, [x, y]) == {x, y} + assert denoms(1/x + 1/y + 1/z, x, y) == {x, y} + assert denoms(1/x + 1/y + 1/z, {x, y}) == {x, y} + + +def test_issue_12476(): + x0, x1, x2, x3, x4, x5 = symbols('x0 x1 x2 x3 x4 x5') + eqns = [x0**2 - x0, x0*x1 - x1, x0*x2 - x2, x0*x3 - x3, x0*x4 - x4, x0*x5 - x5, + x0*x1 - x1, -x0/3 + x1**2 - 2*x2/3, x1*x2 - x1/3 - x2/3 - x3/3, + x1*x3 - x2/3 - x3/3 - x4/3, x1*x4 - 2*x3/3 - x5/3, x1*x5 - x4, x0*x2 - x2, + x1*x2 - x1/3 - x2/3 - x3/3, -x0/6 - x1/6 + x2**2 - x2/6 - x3/3 - x4/6, + -x1/6 + x2*x3 - x2/3 - x3/6 - x4/6 - x5/6, x2*x4 - x2/3 - x3/3 - x4/3, + x2*x5 - x3, x0*x3 - x3, x1*x3 - x2/3 - x3/3 - x4/3, + -x1/6 + x2*x3 - x2/3 - x3/6 - x4/6 - x5/6, + -x0/6 - x1/6 - x2/6 + x3**2 - x3/3 - x4/6, -x1/3 - x2/3 + x3*x4 - x3/3, + -x2 + x3*x5, x0*x4 - x4, x1*x4 - 2*x3/3 - x5/3, x2*x4 - x2/3 - x3/3 - x4/3, + -x1/3 - x2/3 + x3*x4 - x3/3, -x0/3 - 2*x2/3 + x4**2, -x1 + x4*x5, x0*x5 - x5, + x1*x5 - x4, x2*x5 - x3, -x2 + x3*x5, -x1 + x4*x5, -x0 + x5**2, x0 - 1] + sols = [{x0: 1, x3: Rational(1, 6), x2: Rational(1, 6), x4: Rational(-2, 3), x1: Rational(-2, 3), x5: 1}, + {x0: 1, x3: S.Half, x2: Rational(-1, 2), x4: 0, x1: 0, x5: -1}, + {x0: 1, x3: Rational(-1, 3), x2: Rational(-1, 3), x4: Rational(1, 3), x1: Rational(1, 3), x5: 1}, + {x0: 1, x3: 1, x2: 1, x4: 1, x1: 1, x5: 1}, + {x0: 1, x3: Rational(-1, 3), x2: Rational(1, 3), x4: sqrt(5)/3, x1: -sqrt(5)/3, x5: -1}, + {x0: 1, x3: Rational(-1, 3), x2: Rational(1, 3), x4: -sqrt(5)/3, x1: sqrt(5)/3, x5: -1}] + + assert solve(eqns) == sols + + +def test_issue_13849(): + t = symbols('t') + assert solve((t*(sqrt(5) + sqrt(2)) - sqrt(2), t), t) == [] + + +def test_issue_14860(): + from sympy.physics.units import newton, kilo + assert solve(8*kilo*newton + x + y, x) == [-8000*newton - y] + + +def test_issue_14721(): + k, h, a, b = symbols(':4') + assert solve([ + -1 + (-k + 1)**2/b**2 + (-h - 1)**2/a**2, + -1 + (-k + 1)**2/b**2 + (-h + 1)**2/a**2, + h, k + 2], h, k, a, b) == [ + (0, -2, -b*sqrt(1/(b**2 - 9)), b), + (0, -2, b*sqrt(1/(b**2 - 9)), b)] + assert solve([ + h, h/a + 1/b**2 - 2, -h/2 + 1/b**2 - 2], a, h, b) == [ + (a, 0, -sqrt(2)/2), (a, 0, sqrt(2)/2)] + assert solve((a + b**2 - 1, a + b**2 - 2)) == [] + + +def test_issue_14779(): + x = symbols('x', real=True) + assert solve(sqrt(x**4 - 130*x**2 + 1089) + sqrt(x**4 - 130*x**2 + + 3969) - 96*Abs(x)/x,x) == [sqrt(130)] + + +def test_issue_15307(): + assert solve((y - 2, Mul(x + 3,x - 2, evaluate=False))) == \ + [{x: -3, y: 2}, {x: 2, y: 2}] + assert solve((y - 2, Mul(3, x - 2, evaluate=False))) == \ + {x: 2, y: 2} + assert solve((y - 2, Add(x + 4, x - 2, evaluate=False))) == \ + {x: -1, y: 2} + eq1 = Eq(12513*x + 2*y - 219093, -5726*x - y) + eq2 = Eq(-2*x + 8, 2*x - 40) + assert solve([eq1, eq2]) == {x:12, y:75} + + +def test_issue_15415(): + assert solve(x - 3, x) == [3] + assert solve([x - 3], x) == {x:3} + assert solve(Eq(y + 3*x**2/2, y + 3*x), y) == [] + assert solve([Eq(y + 3*x**2/2, y + 3*x)], y) == [] + assert solve([Eq(y + 3*x**2/2, y + 3*x), Eq(x, 1)], y) == [] + + +@slow +def test_issue_15731(): + # f(x)**g(x)=c + assert solve(Eq((x**2 - 7*x + 11)**(x**2 - 13*x + 42), 1)) == [2, 3, 4, 5, 6, 7] + assert solve((x)**(x + 4) - 4) == [-2] + assert solve((-x)**(-x + 4) - 4) == [2] + assert solve((x**2 - 6)**(x**2 - 2) - 4) == [-2, 2] + assert solve((x**2 - 2*x - 1)**(x**2 - 3) - 1/(1 - 2*sqrt(2))) == [sqrt(2)] + assert solve(x**(x + S.Half) - 4*sqrt(2)) == [S(2)] + assert solve((x**2 + 1)**x - 25) == [2] + assert solve(x**(2/x) - 2) == [2, 4] + assert solve((x/2)**(2/x) - sqrt(2)) == [4, 8] + assert solve(x**(x + S.Half) - Rational(9, 4)) == [Rational(3, 2)] + # a**g(x)=c + assert solve((-sqrt(sqrt(2)))**x - 2) == [4, log(2)/(log(2**Rational(1, 4)) + I*pi)] + assert solve((sqrt(2))**x - sqrt(sqrt(2))) == [S.Half] + assert solve((-sqrt(2))**x + 2*(sqrt(2))) == [3, + (3*log(2)**2 + 4*pi**2 - 4*I*pi*log(2))/(log(2)**2 + 4*pi**2)] + assert solve((sqrt(2))**x - 2*(sqrt(2))) == [3] + assert solve(I**x + 1) == [2] + assert solve((1 + I)**x - 2*I) == [2] + assert solve((sqrt(2) + sqrt(3))**x - (2*sqrt(6) + 5)**Rational(1, 3)) == [Rational(2, 3)] + # bases of both sides are equal + b = Symbol('b') + assert solve(b**x - b**2, x) == [2] + assert solve(b**x - 1/b, x) == [-1] + assert solve(b**x - b, x) == [1] + b = Symbol('b', positive=True) + assert solve(b**x - b**2, x) == [2] + assert solve(b**x - 1/b, x) == [-1] + + +def test_issue_10933(): + assert solve(x**4 + y*(x + 0.1), x) # doesn't fail + assert solve(I*x**4 + x**3 + x**2 + 1.) # doesn't fail + + +def test_Abs_handling(): + x = symbols('x', real=True) + assert solve(abs(x/y), x) == [0] + + +def test_issue_7982(): + x = Symbol('x') + # Test that no exception happens + assert solve([2*x**2 + 5*x + 20 <= 0, x >= 1.5], x) is S.false + # From #8040 + assert solve([x**3 - 8.08*x**2 - 56.48*x/5 - 106 >= 0, x - 1 <= 0], [x]) is S.false + + +def test_issue_14645(): + x, y = symbols('x y') + assert solve([x*y - x - y, x*y - x - y], [x, y]) == [(y/(y - 1), y)] + + +def test_issue_12024(): + x, y = symbols('x y') + assert solve(Piecewise((0.0, x < 0.1), (x, x >= 0.1)) - y) == \ + [{y: Piecewise((0.0, x < 0.1), (x, True))}] + + +def test_issue_17452(): + assert solve((7**x)**x + pi, x) == [-sqrt(log(pi) + I*pi)/sqrt(log(7)), + sqrt(log(pi) + I*pi)/sqrt(log(7))] + assert solve(x**(x/11) + pi/11, x) == [exp(LambertW(-11*log(11) + 11*log(pi) + 11*I*pi))] + + +def test_issue_17799(): + assert solve(-erf(x**(S(1)/3))**pi + I, x) == [] + + +def test_issue_17650(): + x = Symbol('x', real=True) + assert solve(abs(abs(x**2 - 1) - x) - x) == [1, -1 + sqrt(2), 1 + sqrt(2)] + + +def test_issue_17882(): + eq = -8*x**2/(9*(x**2 - 1)**(S(4)/3)) + 4/(3*(x**2 - 1)**(S(1)/3)) + assert unrad(eq) is None + + +def test_issue_17949(): + assert solve(exp(+x+x**2), x) == [] + assert solve(exp(-x+x**2), x) == [] + assert solve(exp(+x-x**2), x) == [] + assert solve(exp(-x-x**2), x) == [] + + +def test_issue_10993(): + assert solve(Eq(binomial(x, 2), 3)) == [-2, 3] + assert solve(Eq(pow(x, 2) + binomial(x, 3), x)) == [-4, 0, 1] + assert solve(Eq(binomial(x, 2), 0)) == [0, 1] + assert solve(a+binomial(x, 3), a) == [-binomial(x, 3)] + assert solve(x-binomial(a, 3) + binomial(y, 2) + sin(a), x) == [-sin(a) + binomial(a, 3) - binomial(y, 2)] + assert solve((x+1)-binomial(x+1, 3), x) == [-2, -1, 3] + + +def test_issue_11553(): + eq1 = x + y + 1 + eq2 = x + GoldenRatio + assert solve([eq1, eq2], x, y) == {x: -GoldenRatio, y: -1 + GoldenRatio} + eq3 = x + 2 + TribonacciConstant + assert solve([eq1, eq3], x, y) == {x: -2 - TribonacciConstant, y: 1 + TribonacciConstant} + + +def test_issue_19113_19102(): + t = S(1)/3 + solve(cos(x)**5-sin(x)**5) + assert solve(4*cos(x)**3 - 2*sin(x)**3) == [ + atan(2**(t)), -atan(2**(t)*(1 - sqrt(3)*I)/2), + -atan(2**(t)*(1 + sqrt(3)*I)/2)] + h = S.Half + assert solve(cos(x)**2 + sin(x)) == [ + 2*atan(-h + sqrt(5)/2 + sqrt(2)*sqrt(1 - sqrt(5))/2), + -2*atan(h + sqrt(5)/2 + sqrt(2)*sqrt(1 + sqrt(5))/2), + -2*atan(-sqrt(5)/2 + h + sqrt(2)*sqrt(1 - sqrt(5))/2), + -2*atan(-sqrt(2)*sqrt(1 + sqrt(5))/2 + h + sqrt(5)/2)] + assert solve(3*cos(x) - sin(x)) == [atan(3)] + + +def test_issue_19509(): + a = S(3)/4 + b = S(5)/8 + c = sqrt(5)/8 + d = sqrt(5)/4 + assert solve(1/(x -1)**5 - 1) == [2, + -d + a - sqrt(-b + c), + -d + a + sqrt(-b + c), + d + a - sqrt(-b - c), + d + a + sqrt(-b - c)] + +def test_issue_20747(): + THT, HT, DBH, dib, c0, c1, c2, c3, c4 = symbols('THT HT DBH dib c0 c1 c2 c3 c4') + f = DBH*c3 + THT*c4 + c2 + rhs = 1 - ((HT - 1)/(THT - 1))**c1*(1 - exp(c0/f)) + eq = dib - DBH*(c0 - f*log(rhs)) + term = ((1 - exp((DBH*c0 - dib)/(DBH*(DBH*c3 + THT*c4 + c2)))) + / (1 - exp(c0/(DBH*c3 + THT*c4 + c2)))) + sol = [THT*term**(1/c1) - term**(1/c1) + 1] + assert solve(eq, HT) == sol + + +def test_issue_27001(): + assert solve((x, x**2), (x, y, z), dict=True) == [{x: 0}] + s = a1, a2, a3, a4, a5 = symbols('a1:6') + eqs = [8*a1**4*a2 + 4*a1**2*a2**3 - 8*a1**2*a2*a4 + a2**5/2 - 2*a2**3*a4 + + 8*a2*a3**2 + 2*a2*a4**2 + 8*a2*a5, 12*a1**4 + 6*a1**2*a2**2 - + 8*a1**2*a4 + 3*a2**4/4 - 2*a2**2*a4 + 4*a3**2 + a4**2 + 4*a5, 16*a1**3 + + 4*a1*a2**2 - 8*a1*a4, -8*a1**2*a2 - 2*a2**3 + 4*a2*a4] + sol = [{a4: 2*a1**2 + a2**2/2, a5: -a3**2}, {a1: 0, a2: 0, a5: -a3**2 - a4**2/4}] + assert solve(eqs, s, dict=True) == sol + assert (g:=solve(groebner(eqs, s), dict=True)) == sol, g + + +def test_issue_20902(): + f = (t / ((1 + t) ** 2)) + assert solve(f.subs({t: 3 * x + 2}).diff(x) > 0, x) == (S(-1) < x) & (x < S(-1)/3) + assert solve(f.subs({t: 3 * x + 3}).diff(x) > 0, x) == (S(-4)/3 < x) & (x < S(-2)/3) + assert solve(f.subs({t: 3 * x + 4}).diff(x) > 0, x) == (S(-5)/3 < x) & (x < S(-1)) + assert solve(f.subs({t: 3 * x + 2}).diff(x) > 0, x) == (S(-1) < x) & (x < S(-1)/3) + + +def test_issue_21034(): + a = symbols('a', real=True) + system = [x - cosh(cos(4)), y - sinh(cos(a)), z - tanh(x)] + # constants inside hyperbolic functions should not be rewritten in terms of exp + assert solve(system, x, y, z) == [(cosh(cos(4)), sinh(cos(a)), tanh(cosh(cos(4))))] + # but if the variable of interest is present in a hyperbolic function, + # then it should be rewritten in terms of exp and solved further + newsystem = [(exp(x) - exp(-x)) - tanh(x)*(exp(x) + exp(-x)) + x - 5] + assert solve(newsystem, x) == {x: 5} + + +def test_issue_4886(): + z = a*sqrt(R**2*a**2 + R**2*b**2 - c**2)/(a**2 + b**2) + t = b*c/(a**2 + b**2) + sol = [((b*(t - z) - c)/(-a), t - z), ((b*(t + z) - c)/(-a), t + z)] + assert solve([x**2 + y**2 - R**2, a*x + b*y - c], x, y) == sol + + +def test_issue_6819(): + a, b, c, d = symbols('a b c d', positive=True) + assert solve(a*b**x - c*d**x, x) == [log(c/a)/log(b/d)] + + +def test_issue_17454(): + x = Symbol('x') + assert solve((1 - x - I)**4, x) == [1 - I] + + +def test_issue_21852(): + solution = [21 - 21*sqrt(2)/2] + assert solve(2*x + sqrt(2*x**2) - 21) == solution + + +def test_issue_21942(): + eq = -d + (a*c**(1 - e) + b**(1 - e)*(1 - a))**(1/(1 - e)) + sol = solve(eq, c, simplify=False, check=False) + assert sol == [((a*b**(1 - e) - b**(1 - e) + + d**(1 - e))/a)**(1/(1 - e))] + + +def test_solver_flags(): + root = solve(x**5 + x**2 - x - 1, cubics=False) + rad = solve(x**5 + x**2 - x - 1, cubics=True) + assert root != rad + + +def test_issue_22768(): + eq = 2*x**3 - 16*(y - 1)**6*z**3 + assert solve(eq.expand(), x, simplify=False + ) == [2*z*(y - 1)**2, z*(-1 + sqrt(3)*I)*(y - 1)**2, + -z*(1 + sqrt(3)*I)*(y - 1)**2] + + +def test_issue_22717(): + assert solve((-y**2 + log(y**2/x) + 2, -2*x*y + 2*x/y)) == [ + {y: -1, x: E}, {y: 1, x: E}] + + +def test_issue_25176(): + eq = (x - 5)**-8 - 3 + sol = solve(eq) + assert not any(eq.subs(x, i) for i in sol) + + +def test_issue_10169(): + eq = S(-8*a - x**5*(a + b + c + e) - x**4*(4*a - 2**Rational(3,4)*c + 4*c + + d + 2**Rational(3,4)*e + 4*e + k) - x**3*(-4*2**Rational(3,4)*c + sqrt(2)*c - + 2**Rational(3,4)*d + 4*d + sqrt(2)*e + 4*2**Rational(3,4)*e + 2**Rational(3,4)*k + 4*k) - + x**2*(4*sqrt(2)*c - 4*2**Rational(3,4)*d + sqrt(2)*d + 4*sqrt(2)*e + + sqrt(2)*k + 4*2**Rational(3,4)*k) - x*(2*a + 2*b + 4*sqrt(2)*d + + 4*sqrt(2)*k) + 5) + assert solve_undetermined_coeffs(eq, [a, b, c, d, e, k], x) == { + a: Rational(5,8), + b: Rational(-5,1032), + c: Rational(-40,129) - 5*2**Rational(3,4)/129 + 5*2**Rational(1,4)/1032, + d: -20*2**Rational(3,4)/129 - 10*sqrt(2)/129 - 5*2**Rational(1,4)/258, + e: Rational(-40,129) - 5*2**Rational(1,4)/1032 + 5*2**Rational(3,4)/129, + k: -10*sqrt(2)/129 + 5*2**Rational(1,4)/258 + 20*2**Rational(3,4)/129 + } + + +def test_solve_undetermined_coeffs_issue_23927(): + A, B, r, phi = symbols('A, B, r, phi') + e = Eq(A*sin(t) + B*cos(t), r*sin(t - phi)) + eq = (e.lhs - e.rhs).expand(trig=True) + soln = solve_undetermined_coeffs(eq, (r, phi), t) + assert soln == [{ + phi: 2*atan((A - sqrt(A**2 + B**2))/B), + r: (-A**2 + A*sqrt(A**2 + B**2) - B**2)/(A - sqrt(A**2 + B**2)) + }, { + phi: 2*atan((A + sqrt(A**2 + B**2))/B), + r: (A**2 + A*sqrt(A**2 + B**2) + B**2)/(A + sqrt(A**2 + B**2))/-1 + }] + +def test_issue_24368(): + # Ideally these would produce a solution, but for now just check that they + # don't fail with a RuntimeError + raises(NotImplementedError, lambda: solve(Mod(x**2, 49), x)) + s2 = Symbol('s2', integer=True, positive=True) + f = floor(s2/2 - S(1)/2) + raises(NotImplementedError, lambda: solve((Mod(f**2/(f + 1) + 2*f/(f + 1) + 1/(f + 1), 1))*f + Mod(f**2/(f + 1) + 2*f/(f + 1) + 1/(f + 1), 1), s2)) + + +def test_solve_Piecewise(): + assert [S(10)/3] == solve(3*Piecewise( + (S.NaN, x <= 0), + (20*x - 3*(x - 6)**2/2 - 176, (x >= 0) & (x >= 2) & (x>= 4) & (x >= 6) & (x < 10)), + (100 - 26*x, (x >= 0) & (x >= 2) & (x >= 4) & (x < 10)), + (16*x - 3*(x - 6)**2/2 - 176, (x >= 2) & (x >= 4) & (x >= 6) & (x < 10)), + (100 - 30*x, (x >= 2) & (x >= 4) & (x < 10)), + (30*x - 3*(x - 6)**2/2 - 196, (x>= 0) & (x >= 4) & (x >= 6) & (x < 10)), + (80 - 16*x, (x >= 0) & (x >= 4) & (x < 10)), + (26*x - 3*(x - 6)**2/2 - 196, (x >= 4) & (x >= 6) & (x < 10)), + (80 - 20*x, (x >= 4) & (x < 10)), + (40*x - 3*(x - 6)**2/2 - 256, (x >= 0) & (x >= 2) & (x >= 6) & (x < 10)), + (20 - 6*x, (x >= 0) & (x >= 2) & (x < 10)), + (36*x - 3*(x - 6)**2/2 - 256, (x >= 2) & (x >= 6) & (x < 10)), + (20 - 10*x, (x >= 2) & (x < 10)), + (50*x - 3*(x - 6)**2/2 - 276, (x >= 0) & (x >= 6) & (x < 10)), + (4*x, (x >= 0) & (x < 10)), + (46*x - 3*(x - 6)**2/2 - 276, (x >= 6) & (x < 10)), + (0, x < 10), # this will simplify away + (S.NaN,True))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solveset.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solveset.py new file mode 100644 index 0000000000000000000000000000000000000000..a1ba7a11e68ed518c4d83c050947b78756ade181 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/solvers/tests/test_solveset.py @@ -0,0 +1,3548 @@ +from math import isclose + +from sympy.calculus.util import stationary_points +from sympy.core.containers import Tuple +from sympy.core.function import (Function, Lambda, nfloat, diff) +from sympy.core.mod import Mod +from sympy.core.numbers import (E, I, Rational, oo, pi, Integer, all_close) +from sympy.core.relational import (Eq, Gt, Ne, Ge) +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.elementary.complexes import (Abs, arg, im, re, sign, conjugate) +from sympy.functions.elementary.exponential import (LambertW, exp, log) +from sympy.functions.elementary.hyperbolic import (HyperbolicFunction, + sinh, cosh, tanh, coth, sech, csch, asinh, acosh, atanh, acoth, asech, acsch) +from sympy.functions.elementary.miscellaneous import sqrt, Min, Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import ( + TrigonometricFunction, acos, acot, acsc, asec, asin, atan, atan2, + cos, cot, csc, sec, sin, tan) +from sympy.functions.special.error_functions import (erf, erfc, + erfcinv, erfinv) +from sympy.logic.boolalg import And +from sympy.matrices.dense import MutableDenseMatrix as Matrix +from sympy.matrices.immutable import ImmutableDenseMatrix +from sympy.polys.polytools import Poly +from sympy.polys.rootoftools import CRootOf +from sympy.sets.contains import Contains +from sympy.sets.conditionset import ConditionSet +from sympy.sets.fancysets import ImageSet, Range +from sympy.sets.sets import (Complement, FiniteSet, + Intersection, Interval, Union, imageset, ProductSet) +from sympy.simplify import simplify +from sympy.tensor.indexed import Indexed +from sympy.utilities.iterables import numbered_symbols + +from sympy.testing.pytest import (XFAIL, raises, skip, slow, SKIP, _both_exp_pow) +from sympy.core.random import verify_numerically as tn +from sympy.physics.units import cm + +from sympy.solvers import solve +from sympy.solvers.solveset import ( + solveset_real, domain_check, solveset_complex, linear_eq_to_matrix, + linsolve, _is_function_class_equation, invert_real, invert_complex, + _invert_trig_hyp_real, solveset, solve_decomposition, substitution, + nonlinsolve, solvify, + _is_finite_with_finite_vars, _transolve, _is_exponential, + _solve_exponential, _is_logarithmic, _is_lambert, + _solve_logarithm, _term_factors, _is_modular, NonlinearError) + +from sympy.abc import (a, b, c, d, e, f, g, h, i, j, k, l, m, n, q, r, + t, w, x, y, z) + + +def dumeq(i, j): + if type(i) in (list, tuple): + return all(dumeq(i, j) for i, j in zip(i, j)) + return i == j or i.dummy_eq(j) + + +def assert_close_ss(sol1, sol2): + """Test solutions with floats from solveset are close""" + sol1 = sympify(sol1) + sol2 = sympify(sol2) + assert isinstance(sol1, FiniteSet) + assert isinstance(sol2, FiniteSet) + assert len(sol1) == len(sol2) + assert all(isclose(v1, v2) for v1, v2 in zip(sol1, sol2)) + + +def assert_close_nl(sol1, sol2): + """Test solutions with floats from nonlinsolve are close""" + sol1 = sympify(sol1) + sol2 = sympify(sol2) + assert isinstance(sol1, FiniteSet) + assert isinstance(sol2, FiniteSet) + assert len(sol1) == len(sol2) + for s1, s2 in zip(sol1, sol2): + assert len(s1) == len(s2) + assert all(isclose(v1, v2) for v1, v2 in zip(s1, s2)) + + +@_both_exp_pow +def test_invert_real(): + x = Symbol('x', real=True) + + def ireal(x, s=S.Reals): + return Intersection(s, x) + + assert invert_real(exp(x), z, x) == (x, ireal(FiniteSet(log(z)))) + + y = Symbol('y', positive=True) + n = Symbol('n', real=True) + assert invert_real(x + 3, y, x) == (x, FiniteSet(y - 3)) + assert invert_real(x*3, y, x) == (x, FiniteSet(y / 3)) + + assert invert_real(exp(x), y, x) == (x, FiniteSet(log(y))) + assert invert_real(exp(3*x), y, x) == (x, FiniteSet(log(y) / 3)) + assert invert_real(exp(x + 3), y, x) == (x, FiniteSet(log(y) - 3)) + + assert invert_real(exp(x) + 3, y, x) == (x, ireal(FiniteSet(log(y - 3)))) + assert invert_real(exp(x)*3, y, x) == (x, FiniteSet(log(y / 3))) + + assert invert_real(log(x), y, x) == (x, FiniteSet(exp(y))) + assert invert_real(log(3*x), y, x) == (x, FiniteSet(exp(y) / 3)) + assert invert_real(log(x + 3), y, x) == (x, FiniteSet(exp(y) - 3)) + + assert invert_real(Abs(x), y, x) == (x, FiniteSet(y, -y)) + + assert invert_real(2**x, y, x) == (x, FiniteSet(log(y)/log(2))) + assert invert_real(2**exp(x), y, x) == (x, ireal(FiniteSet(log(log(y)/log(2))))) + + assert invert_real(x**2, y, x) == (x, FiniteSet(sqrt(y), -sqrt(y))) + assert invert_real(x**S.Half, y, x) == (x, FiniteSet(y**2)) + + raises(ValueError, lambda: invert_real(x, x, x)) + + # issue 21236 + assert invert_real(x**pi, y, x) == (x, FiniteSet(y**(1/pi))) + assert invert_real(x**pi, -E, x) == (x, S.EmptySet) + assert invert_real(x**Rational(3/2), 1000, x) == (x, FiniteSet(100)) + assert invert_real(x**1.0, 1, x) == (x**1.0, FiniteSet(1)) + + raises(ValueError, lambda: invert_real(S.One, y, x)) + + assert invert_real(x**31 + x, y, x) == (x**31 + x, FiniteSet(y)) + + lhs = x**31 + x + base_values = FiniteSet(y - 1, -y - 1) + assert invert_real(Abs(x**31 + x + 1), y, x) == (lhs, base_values) + + assert dumeq(invert_real(sin(x), y, x), (x, + ConditionSet(x, (S(-1) <= y) & (y <= S(1)), Union( + ImageSet(Lambda(n, 2*n*pi + asin(y)), S.Integers), + ImageSet(Lambda(n, pi*2*n + pi - asin(y)), S.Integers))))) + + assert dumeq(invert_real(sin(exp(x)), y, x), (x, + ConditionSet(x, (S(-1) <= y) & (y <= S(1)), Union( + ImageSet(Lambda(n, log(2*n*pi + asin(y))), S.Integers), + ImageSet(Lambda(n, log(pi*2*n + pi - asin(y))), S.Integers))))) + + assert dumeq(invert_real(csc(x), y, x), (x, + ConditionSet(x, ((S(1) <= y) & (y < oo)) | ((-oo < y) & (y <= S(-1))), + Union(ImageSet(Lambda(n, 2*n*pi + acsc(y)), S.Integers), + ImageSet(Lambda(n, 2*n*pi - acsc(y) + pi), S.Integers))))) + + assert dumeq(invert_real(csc(exp(x)), y, x), (x, + ConditionSet(x, ((S(1) <= y) & (y < oo)) | ((-oo < y) & (y <= S(-1))), + Union(ImageSet(Lambda(n, log(2*n*pi + acsc(y))), S.Integers), + ImageSet(Lambda(n, log(2*n*pi - acsc(y) + pi)), S.Integers))))) + + assert dumeq(invert_real(cos(x), y, x), (x, + ConditionSet(x, (S(-1) <= y) & (y <= S(1)), Union( + ImageSet(Lambda(n, 2*n*pi + acos(y)), S.Integers), + ImageSet(Lambda(n, 2*n*pi - acos(y)), S.Integers))))) + + assert dumeq(invert_real(cos(exp(x)), y, x), (x, + ConditionSet(x, (S(-1) <= y) & (y <= S(1)), Union( + ImageSet(Lambda(n, log(2*n*pi + acos(y))), S.Integers), + ImageSet(Lambda(n, log(2*n*pi - acos(y))), S.Integers))))) + + assert dumeq(invert_real(sec(x), y, x), (x, + ConditionSet(x, ((S(1) <= y) & (y < oo)) | ((-oo < y) & (y <= S(-1))), + Union(ImageSet(Lambda(n, 2*n*pi + asec(y)), S.Integers), \ + ImageSet(Lambda(n, 2*n*pi - asec(y)), S.Integers))))) + + assert dumeq(invert_real(sec(exp(x)), y, x), (x, + ConditionSet(x, ((S(1) <= y) & (y < oo)) | ((-oo < y) & (y <= S(-1))), + Union(ImageSet(Lambda(n, log(2*n*pi - asec(y))), S.Integers), + ImageSet(Lambda(n, log(2*n*pi + asec(y))), S.Integers))))) + + assert dumeq(invert_real(tan(x), y, x), (x, + ConditionSet(x, (-oo < y) & (y < oo), + ImageSet(Lambda(n, n*pi + atan(y)), S.Integers)))) + + assert dumeq(invert_real(tan(exp(x)), y, x), (x, + ConditionSet(x, (-oo < y) & (y < oo), + ImageSet(Lambda(n, log(n*pi + atan(y))), S.Integers)))) + + assert dumeq(invert_real(cot(x), y, x), (x, + ConditionSet(x, (-oo < y) & (y < oo), + ImageSet(Lambda(n, n*pi + acot(y)), S.Integers)))) + + assert dumeq(invert_real(cot(exp(x)), y, x), (x, + ConditionSet(x, (-oo < y) & (y < oo), + ImageSet(Lambda(n, log(n*pi + acot(y))), S.Integers)))) + + assert dumeq(invert_real(tan(tan(x)), y, x), + (x, ConditionSet(x, Eq(tan(tan(x)), y), S.Reals))) + # slight regression compared to previous result: + # (tan(x), imageset(Lambda(n, n*pi + atan(y)), S.Integers))) + + x = Symbol('x', positive=True) + assert invert_real(x**pi, y, x) == (x, FiniteSet(y**(1/pi))) + + r = Symbol('r', real=True) + p = Symbol('p', positive=True) + assert invert_real(sinh(x), r, x) == (x, FiniteSet(asinh(r))) + assert invert_real(sinh(log(x)), p, x) == (x, FiniteSet(exp(asinh(p)))) + + assert invert_real(cosh(x), r, x) == (x, Intersection( + FiniteSet(-acosh(r), acosh(r)), S.Reals)) + assert invert_real(cosh(x), p + 1, x) == (x, + FiniteSet(-acosh(p + 1), acosh(p + 1))) + + assert invert_real(tanh(x), r, x) == (x, Intersection(FiniteSet(atanh(r)), S.Reals)) + assert invert_real(coth(x), p+1, x) == (x, FiniteSet(acoth(p+1))) + assert invert_real(sech(x), r, x) == (x, Intersection( + FiniteSet(-asech(r), asech(r)), S.Reals)) + assert invert_real(csch(x), p, x) == (x, FiniteSet(acsch(p))) + + assert dumeq(invert_real(tanh(sin(x)), r, x), (x, + ConditionSet(x, (S(-1) <= atanh(r)) & (atanh(r) <= S(1)), Union( + ImageSet(Lambda(n, 2*n*pi + asin(atanh(r))), S.Integers), + ImageSet(Lambda(n, 2*n*pi - asin(atanh(r)) + pi), S.Integers))))) + + +def test_invert_trig_hyp_real(): + # check some codepaths that are not as easily reached otherwise + n = Dummy('n') + assert _invert_trig_hyp_real(cosh(x), Range(-5, 10, 1), x)[1].dummy_eq(Union( + ImageSet(Lambda(n, -acosh(n)), Range(1, 10, 1)), + ImageSet(Lambda(n, acosh(n)), Range(1, 10, 1)))) + assert _invert_trig_hyp_real(coth(x), Interval(-3, 2), x) == (x, Union( + Interval(-oo, -acoth(3)), Interval(acoth(2), oo))) + assert _invert_trig_hyp_real(tanh(x), Interval(-S.Half, 1), x) == (x, + Interval(-atanh(S.Half), oo)) + assert _invert_trig_hyp_real(sech(x), imageset(n, S.Half + n/3, S.Naturals0), x) == \ + (x, FiniteSet(-asech(S(1)/2), asech(S(1)/2), -asech(S(5)/6), asech(S(5)/6))) + assert _invert_trig_hyp_real(csch(x), S.Reals, x) == (x, + Union(Interval.open(-oo, 0), Interval.open(0, oo))) + + +def test_invert_complex(): + assert invert_complex(x + 3, y, x) == (x, FiniteSet(y - 3)) + assert invert_complex(x*3, y, x) == (x, FiniteSet(y / 3)) + assert invert_complex((x - 1)**3, 0, x) == (x, FiniteSet(1)) + + assert dumeq(invert_complex(exp(x), y, x), + (x, imageset(Lambda(n, I*(2*pi*n + arg(y)) + log(Abs(y))), S.Integers))) + + assert invert_complex(log(x), y, x) == (x, FiniteSet(exp(y))) + + raises(ValueError, lambda: invert_real(1, y, x)) + raises(ValueError, lambda: invert_complex(x, x, x)) + raises(ValueError, lambda: invert_complex(x, x, 1)) + + assert dumeq(invert_complex(sin(x), I, x), (x, Union( + ImageSet(Lambda(n, 2*n*pi + I*log(1 + sqrt(2))), S.Integers), + ImageSet(Lambda(n, 2*n*pi + pi - I*log(1 + sqrt(2))), S.Integers)))) + assert dumeq(invert_complex(cos(x), 1+I, x), (x, Union( + ImageSet(Lambda(n, 2*n*pi - acos(1 + I)), S.Integers), + ImageSet(Lambda(n, 2*n*pi + acos(1 + I)), S.Integers)))) + assert dumeq(invert_complex(tan(2*x), 1, x), (x, + ImageSet(Lambda(n, n*pi/2 + pi/8), S.Integers))) + assert dumeq(invert_complex(cot(x), 2*I, x), (x, + ImageSet(Lambda(n, n*pi - I*acoth(2)), S.Integers))) + + assert dumeq(invert_complex(sinh(x), 0, x), (x, Union( + ImageSet(Lambda(n, 2*n*I*pi), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi + I*pi), S.Integers)))) + assert dumeq(invert_complex(cosh(x), 0, x), (x, Union( + ImageSet(Lambda(n, 2*n*I*pi + I*pi/2), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi + 3*I*pi/2), S.Integers)))) + assert invert_complex(tanh(x), 1, x) == (x, S.EmptySet) + assert dumeq(invert_complex(tanh(x), a, x), (x, + ConditionSet(x, Ne(a, -1) & Ne(a, 1), + ImageSet(Lambda(n, n*I*pi + atanh(a)), S.Integers)))) + assert invert_complex(coth(x), 1, x) == (x, S.EmptySet) + assert dumeq(invert_complex(coth(x), a, x), (x, + ConditionSet(x, Ne(a, -1) & Ne(a, 1), + ImageSet(Lambda(n, n*I*pi + acoth(a)), S.Integers)))) + assert dumeq(invert_complex(sech(x), 2, x), (x, Union( + ImageSet(Lambda(n, 2*n*I*pi + I*pi/3), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi + 5*I*pi/3), S.Integers)))) + + +def test_domain_check(): + assert domain_check(1/(1 + (1/(x+1))**2), x, -1) is False + assert domain_check(x**2, x, 0) is True + assert domain_check(x, x, oo) is False + assert domain_check(0, x, oo) is False + + +def test_issue_11536(): + assert solveset(0**x - 100, x, S.Reals) == S.EmptySet + assert solveset(0**x - 1, x, S.Reals) == FiniteSet(0) + + +def test_issue_17479(): + f = (x**2 + y**2)**2 + (x**2 + z**2)**2 - 2*(2*x**2 + y**2 + z**2) + fx = f.diff(x) + fy = f.diff(y) + fz = f.diff(z) + sol = nonlinsolve([fx, fy, fz], [x, y, z]) + assert len(sol) >= 4 and len(sol) <= 20 + # nonlinsolve has been giving a varying number of solutions + # (originally 18, then 20, now 19) due to various internal changes. + # Unfortunately not all the solutions are actually valid and some are + # redundant. Since the original issue was that an exception was raised, + # this first test only checks that nonlinsolve returns a "plausible" + # solution set. The next test checks the result for correctness. + + +@XFAIL +def test_issue_18449(): + x, y, z = symbols("x, y, z") + f = (x**2 + y**2)**2 + (x**2 + z**2)**2 - 2*(2*x**2 + y**2 + z**2) + fx = diff(f, x) + fy = diff(f, y) + fz = diff(f, z) + sol = nonlinsolve([fx, fy, fz], [x, y, z]) + for (xs, ys, zs) in sol: + d = {x: xs, y: ys, z: zs} + assert tuple(_.subs(d).simplify() for _ in (fx, fy, fz)) == (0, 0, 0) + # After simplification and removal of duplicate elements, there should + # only be 4 parametric solutions left: + # simplifiedsolutions = FiniteSet((sqrt(1 - z**2), z, z), + # (-sqrt(1 - z**2), z, z), + # (sqrt(1 - z**2), -z, z), + # (-sqrt(1 - z**2), -z, z)) + # TODO: Is the above solution set definitely complete? + + +def test_issue_21047(): + f = (2 - x)**2 + (sqrt(x - 1) - 1)**6 + assert solveset(f, x, S.Reals) == FiniteSet(2) + + f = (sqrt(x)-1)**2 + (sqrt(x)+1)**2 -2*x**2 + sqrt(2) + assert solveset(f, x, S.Reals) == FiniteSet( + S.Half - sqrt(2*sqrt(2) + 5)/2, S.Half + sqrt(2*sqrt(2) + 5)/2) + + +def test_is_function_class_equation(): + assert _is_function_class_equation(TrigonometricFunction, + tan(x), x) is True + assert _is_function_class_equation(TrigonometricFunction, + tan(x) - 1, x) is True + assert _is_function_class_equation(TrigonometricFunction, + tan(x) + sin(x), x) is True + assert _is_function_class_equation(TrigonometricFunction, + tan(x) + sin(x) - a, x) is True + assert _is_function_class_equation(TrigonometricFunction, + sin(x)*tan(x) + sin(x), x) is True + assert _is_function_class_equation(TrigonometricFunction, + sin(x)*tan(x + a) + sin(x), x) is True + assert _is_function_class_equation(TrigonometricFunction, + sin(x)*tan(x*a) + sin(x), x) is True + assert _is_function_class_equation(TrigonometricFunction, + a*tan(x) - 1, x) is True + assert _is_function_class_equation(TrigonometricFunction, + tan(x)**2 + sin(x) - 1, x) is True + assert _is_function_class_equation(TrigonometricFunction, + tan(x) + x, x) is False + assert _is_function_class_equation(TrigonometricFunction, + tan(x**2), x) is False + assert _is_function_class_equation(TrigonometricFunction, + tan(x**2) + sin(x), x) is False + assert _is_function_class_equation(TrigonometricFunction, + tan(x)**sin(x), x) is False + assert _is_function_class_equation(TrigonometricFunction, + tan(sin(x)) + sin(x), x) is False + assert _is_function_class_equation(HyperbolicFunction, + tanh(x), x) is True + assert _is_function_class_equation(HyperbolicFunction, + tanh(x) - 1, x) is True + assert _is_function_class_equation(HyperbolicFunction, + tanh(x) + sinh(x), x) is True + assert _is_function_class_equation(HyperbolicFunction, + tanh(x) + sinh(x) - a, x) is True + assert _is_function_class_equation(HyperbolicFunction, + sinh(x)*tanh(x) + sinh(x), x) is True + assert _is_function_class_equation(HyperbolicFunction, + sinh(x)*tanh(x + a) + sinh(x), x) is True + assert _is_function_class_equation(HyperbolicFunction, + sinh(x)*tanh(x*a) + sinh(x), x) is True + assert _is_function_class_equation(HyperbolicFunction, + a*tanh(x) - 1, x) is True + assert _is_function_class_equation(HyperbolicFunction, + tanh(x)**2 + sinh(x) - 1, x) is True + assert _is_function_class_equation(HyperbolicFunction, + tanh(x) + x, x) is False + assert _is_function_class_equation(HyperbolicFunction, + tanh(x**2), x) is False + assert _is_function_class_equation(HyperbolicFunction, + tanh(x**2) + sinh(x), x) is False + assert _is_function_class_equation(HyperbolicFunction, + tanh(x)**sinh(x), x) is False + assert _is_function_class_equation(HyperbolicFunction, + tanh(sinh(x)) + sinh(x), x) is False + + +def test_garbage_input(): + raises(ValueError, lambda: solveset_real([y], y)) + x = Symbol('x', real=True) + assert solveset_real(x, 1) == S.EmptySet + assert solveset_real(x - 1, 1) == FiniteSet(x) + assert solveset_real(x, pi) == S.EmptySet + assert solveset_real(x, x**2) == S.EmptySet + + raises(ValueError, lambda: solveset_complex([x], x)) + assert solveset_complex(x, pi) == S.EmptySet + + raises(ValueError, lambda: solveset((x, y), x)) + raises(ValueError, lambda: solveset(x + 1, S.Reals)) + raises(ValueError, lambda: solveset(x + 1, x, 2)) + + +def test_solve_mul(): + assert solveset_real((a*x + b)*(exp(x) - 3), x) == \ + Union({log(3)}, Intersection({-b/a}, S.Reals)) + anz = Symbol('anz', nonzero=True) + bb = Symbol('bb', real=True) + assert solveset_real((anz*x + bb)*(exp(x) - 3), x) == \ + FiniteSet(-bb/anz, log(3)) + assert solveset_real((2*x + 8)*(8 + exp(x)), x) == FiniteSet(S(-4)) + assert solveset_real(x/log(x), x) is S.EmptySet + + +def test_solve_invert(): + assert solveset_real(exp(x) - 3, x) == FiniteSet(log(3)) + assert solveset_real(log(x) - 3, x) == FiniteSet(exp(3)) + + assert solveset_real(3**(x + 2), x) == FiniteSet() + assert solveset_real(3**(2 - x), x) == FiniteSet() + + assert solveset_real(y - b*exp(a/x), x) == Intersection( + S.Reals, FiniteSet(a/log(y/b))) + + # issue 4504 + assert solveset_real(2**x - 10, x) == FiniteSet(1 + log(5)/log(2)) + + +def test_issue_25768(): + assert dumeq(solveset_real(sin(x) - S.Half, x), Union( + ImageSet(Lambda(n, pi*2*n + pi/6), S.Integers), + ImageSet(Lambda(n, pi*2*n + pi*5/6), S.Integers))) + n1 = solveset_real(sin(x) - 0.5, x).n(5) + n2 = solveset_real(sin(x) - S.Half, x).n(5) + # help pass despite fp differences + eq = [i.replace( + lambda x:x.is_Float, + lambda x:Rational(x).limit_denominator(1000)) for i in (n1, n2)] + assert dumeq(*eq),(n1,n2) + + +def test_errorinverses(): + assert solveset_real(erf(x) - S.Half, x) == \ + FiniteSet(erfinv(S.Half)) + assert solveset_real(erfinv(x) - 2, x) == \ + FiniteSet(erf(2)) + assert solveset_real(erfc(x) - S.One, x) == \ + FiniteSet(erfcinv(S.One)) + assert solveset_real(erfcinv(x) - 2, x) == FiniteSet(erfc(2)) + + +def test_solve_polynomial(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + assert solveset_real(3*x - 2, x) == FiniteSet(Rational(2, 3)) + + assert solveset_real(x**2 - 1, x) == FiniteSet(-S.One, S.One) + assert solveset_real(x - y**3, x) == FiniteSet(y ** 3) + + assert solveset_real(x**3 - 15*x - 4, x) == FiniteSet( + -2 + 3 ** S.Half, + S(4), + -2 - 3 ** S.Half) + + assert solveset_real(sqrt(x) - 1, x) == FiniteSet(1) + assert solveset_real(sqrt(x) - 2, x) == FiniteSet(4) + assert solveset_real(x**Rational(1, 4) - 2, x) == FiniteSet(16) + assert solveset_real(x**Rational(1, 3) - 3, x) == FiniteSet(27) + assert len(solveset_real(x**5 + x**3 + 1, x)) == 1 + assert len(solveset_real(-2*x**3 + 4*x**2 - 2*x + 6, x)) > 0 + assert solveset_real(x**6 + x**4 + I, x) is S.EmptySet + + +def test_return_root_of(): + f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20 + s = list(solveset_complex(f, x)) + for root in s: + assert root.func == CRootOf + + # if one uses solve to get the roots of a polynomial that has a CRootOf + # solution, make sure that the use of nfloat during the solve process + # doesn't fail. Note: if you want numerical solutions to a polynomial + # it is *much* faster to use nroots to get them than to solve the + # equation only to get CRootOf solutions which are then numerically + # evaluated. So for eq = x**5 + 3*x + 7 do Poly(eq).nroots() rather + # than [i.n() for i in solve(eq)] to get the numerical roots of eq. + assert nfloat(list(solveset_complex(x**5 + 3*x**3 + 7, x))[0], + exponent=False) == CRootOf(x**5 + 3*x**3 + 7, 0).n() + + sol = list(solveset_complex(x**6 - 2*x + 2, x)) + assert all(isinstance(i, CRootOf) for i in sol) and len(sol) == 6 + + f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20 + s = list(solveset_complex(f, x)) + for root in s: + assert root.func == CRootOf + + s = x**5 + 4*x**3 + 3*x**2 + Rational(7, 4) + assert solveset_complex(s, x) == \ + FiniteSet(*Poly(s*4, domain='ZZ').all_roots()) + + # Refer issue #7876 + eq = x*(x - 1)**2*(x + 1)*(x**6 - x + 1) + assert solveset_complex(eq, x) == \ + FiniteSet(-1, 0, 1, CRootOf(x**6 - x + 1, 0), + CRootOf(x**6 - x + 1, 1), + CRootOf(x**6 - x + 1, 2), + CRootOf(x**6 - x + 1, 3), + CRootOf(x**6 - x + 1, 4), + CRootOf(x**6 - x + 1, 5)) + + +def test_solveset_sqrt_1(): + assert solveset_real(sqrt(5*x + 6) - 2 - x, x) == \ + FiniteSet(-S.One, S(2)) + assert solveset_real(sqrt(x - 1) - x + 7, x) == FiniteSet(10) + assert solveset_real(sqrt(x - 2) - 5, x) == FiniteSet(27) + assert solveset_real(sqrt(x) - 2 - 5, x) == FiniteSet(49) + assert solveset_real(sqrt(x**3), x) == FiniteSet(0) + assert solveset_real(sqrt(x - 1), x) == FiniteSet(1) + assert solveset_real(sqrt((x-3)/x), x) == FiniteSet(3) + assert solveset_real(sqrt((x-3)/x)-Rational(1, 2), x) == \ + FiniteSet(4) + +def test_solveset_sqrt_2(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + # http://tutorial.math.lamar.edu/Classes/Alg/SolveRadicalEqns.aspx#Solve_Rad_Ex2_a + assert solveset_real(sqrt(2*x - 1) - sqrt(x - 4) - 2, x) == \ + FiniteSet(S(5), S(13)) + assert solveset_real(sqrt(x + 7) + 2 - sqrt(3 - x), x) == \ + FiniteSet(-6) + + # http://www.purplemath.com/modules/solverad.htm + assert solveset_real(sqrt(17*x - sqrt(x**2 - 5)) - 7, x) == \ + FiniteSet(3) + + eq = x + 1 - (x**4 + 4*x**3 - x)**Rational(1, 4) + assert solveset_real(eq, x) == FiniteSet(Rational(-1, 2), Rational(-1, 3)) + + eq = sqrt(2*x + 9) - sqrt(x + 1) - sqrt(x + 4) + assert solveset_real(eq, x) == FiniteSet(0) + + eq = sqrt(x + 4) + sqrt(2*x - 1) - 3*sqrt(x - 1) + assert solveset_real(eq, x) == FiniteSet(5) + + eq = sqrt(x)*sqrt(x - 7) - 12 + assert solveset_real(eq, x) == FiniteSet(16) + + eq = sqrt(x - 3) + sqrt(x) - 3 + assert solveset_real(eq, x) == FiniteSet(4) + + eq = sqrt(2*x**2 - 7) - (3 - x) + assert solveset_real(eq, x) == FiniteSet(-S(8), S(2)) + + # others + eq = sqrt(9*x**2 + 4) - (3*x + 2) + assert solveset_real(eq, x) == FiniteSet(0) + + assert solveset_real(sqrt(x - 3) - sqrt(x) - 3, x) == FiniteSet() + + eq = (2*x - 5)**Rational(1, 3) - 3 + assert solveset_real(eq, x) == FiniteSet(16) + + assert solveset_real(sqrt(x) + sqrt(sqrt(x)) - 4, x) == \ + FiniteSet((Rational(-1, 2) + sqrt(17)/2)**4) + + eq = sqrt(x) - sqrt(x - 1) + sqrt(sqrt(x)) + assert solveset_real(eq, x) == FiniteSet() + + eq = (x - 4)**2 + (sqrt(x) - 2)**4 + assert solveset_real(eq, x) == FiniteSet(-4, 4) + + eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5) + ans = solveset_real(eq, x) + ra = S('''-1484/375 - 4*(-S(1)/2 + sqrt(3)*I/2)*(-12459439/52734375 + + 114*sqrt(12657)/78125)**(S(1)/3) - 172564/(140625*(-S(1)/2 + + sqrt(3)*I/2)*(-12459439/52734375 + 114*sqrt(12657)/78125)**(S(1)/3))''') + rb = Rational(4, 5) + assert all(abs(eq.subs(x, i).n()) < 1e-10 for i in (ra, rb)) and \ + len(ans) == 2 and \ + {i.n(chop=True) for i in ans} == \ + {i.n(chop=True) for i in (ra, rb)} + + assert solveset_real(sqrt(x) + x**Rational(1, 3) + + x**Rational(1, 4), x) == FiniteSet(0) + + assert solveset_real(x/sqrt(x**2 + 1), x) == FiniteSet(0) + + eq = (x - y**3)/((y**2)*sqrt(1 - y**2)) + assert solveset_real(eq, x) == FiniteSet(y**3) + + # issue 4497 + assert solveset_real(1/(5 + x)**Rational(1, 5) - 9, x) == \ + FiniteSet(Rational(-295244, 59049)) + + +@XFAIL +def test_solve_sqrt_fail(): + # this only works if we check real_root(eq.subs(x, Rational(1, 3))) + # but checksol doesn't work like that + eq = (x**3 - 3*x**2)**Rational(1, 3) + 1 - x + assert solveset_real(eq, x) == FiniteSet(Rational(1, 3)) + + +@slow +def test_solve_sqrt_3(): + R = Symbol('R') + eq = sqrt(2)*R*sqrt(1/(R + 1)) + (R + 1)*(sqrt(2)*sqrt(1/(R + 1)) - 1) + sol = solveset_complex(eq, R) + fset = [Rational(5, 3) + 4*sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3, + -sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3 + + 40*re(1/((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 + + sqrt(30)*sin(atan(3*sqrt(111)/251)/3)/3 + Rational(5, 3) + + I*(-sqrt(30)*cos(atan(3*sqrt(111)/251)/3)/3 - + sqrt(10)*sin(atan(3*sqrt(111)/251)/3)/3 + + 40*im(1/((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9)] + cset = [40*re(1/((Rational(-1, 2) + sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 - + sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3 - sqrt(30)*sin(atan(3*sqrt(111)/251)/3)/3 + + Rational(5, 3) + + I*(40*im(1/((Rational(-1, 2) + sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 - + sqrt(10)*sin(atan(3*sqrt(111)/251)/3)/3 + + sqrt(30)*cos(atan(3*sqrt(111)/251)/3)/3)] + + fs = FiniteSet(*fset) + cs = ConditionSet(R, Eq(eq, 0), FiniteSet(*cset)) + assert sol == (fs - {-1}) | (cs - {-1}) + + # the number of real roots will depend on the value of m: for m=1 there are 4 + # and for m=-1 there are none. + eq = -sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) + sqrt((-m**2/2 - sqrt( + 4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m - sqrt( + 4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2) + unsolved_object = ConditionSet(q, Eq(sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) - + sqrt((-m**2/2 - sqrt(4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m - + sqrt(4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2), 0), S.Reals) + assert solveset_real(eq, q) == unsolved_object + + +def test_solve_polynomial_symbolic_param(): + assert solveset_complex((x**2 - 1)**2 - a, x) == \ + FiniteSet(sqrt(1 + sqrt(a)), -sqrt(1 + sqrt(a)), + sqrt(1 - sqrt(a)), -sqrt(1 - sqrt(a))) + + # issue 4507 + assert solveset_complex(y - b/(1 + a*x), x) == \ + FiniteSet((b/y - 1)/a) - FiniteSet(-1/a) + + # issue 4508 + assert solveset_complex(y - b*x/(a + x), x) == \ + FiniteSet(-a*y/(y - b)) - FiniteSet(-a) + + +def test_solve_rational(): + assert solveset_real(1/x + 1, x) == FiniteSet(-S.One) + assert solveset_real(1/exp(x) - 1, x) == FiniteSet(0) + assert solveset_real(x*(1 - 5/x), x) == FiniteSet(5) + assert solveset_real(2*x/(x + 2) - 1, x) == FiniteSet(2) + assert solveset_real((x**2/(7 - x)).diff(x), x) == \ + FiniteSet(S.Zero, S(14)) + + +def test_solveset_real_gen_is_pow(): + assert solveset_real(sqrt(1) + 1, x) is S.EmptySet + + +def test_no_sol(): + assert solveset(1 - oo*x) is S.EmptySet + assert solveset(oo*x, x) is S.EmptySet + assert solveset(oo*x - oo, x) is S.EmptySet + assert solveset_real(4, x) is S.EmptySet + assert solveset_real(exp(x), x) is S.EmptySet + assert solveset_real(x**2 + 1, x) is S.EmptySet + assert solveset_real(-3*a/sqrt(x), x) is S.EmptySet + assert solveset_real(1/x, x) is S.EmptySet + assert solveset_real(-(1 + x)/(2 + x)**2 + 1/(2 + x), x + ) is S.EmptySet + + +def test_sol_zero_real(): + assert solveset_real(0, x) == S.Reals + assert solveset(0, x, Interval(1, 2)) == Interval(1, 2) + assert solveset_real(-x**2 - 2*x + (x + 1)**2 - 1, x) == S.Reals + + +def test_no_sol_rational_extragenous(): + assert solveset_real((x/(x + 1) + 3)**(-2), x) is S.EmptySet + assert solveset_real((x - 1)/(1 + 1/(x - 1)), x) is S.EmptySet + + +def test_solve_polynomial_cv_1a(): + """ + Test for solving on equations that can be converted to + a polynomial equation using the change of variable y -> x**Rational(p, q) + """ + assert solveset_real(sqrt(x) - 1, x) == FiniteSet(1) + assert solveset_real(sqrt(x) - 2, x) == FiniteSet(4) + assert solveset_real(x**Rational(1, 4) - 2, x) == FiniteSet(16) + assert solveset_real(x**Rational(1, 3) - 3, x) == FiniteSet(27) + assert solveset_real(x*(x**(S.One / 3) - 3), x) == \ + FiniteSet(S.Zero, S(27)) + + +def test_solveset_real_rational(): + """Test solveset_real for rational functions""" + x = Symbol('x', real=True) + y = Symbol('y', real=True) + assert solveset_real((x - y**3) / ((y**2)*sqrt(1 - y**2)), x) \ + == FiniteSet(y**3) + # issue 4486 + assert solveset_real(2*x/(x + 2) - 1, x) == FiniteSet(2) + + +def test_solveset_real_log(): + assert solveset_real(log((x-1)*(x+1)), x) == \ + FiniteSet(sqrt(2), -sqrt(2)) + + +def test_poly_gens(): + assert solveset_real(4**(2*(x**2) + 2*x) - 8, x) == \ + FiniteSet(Rational(-3, 2), S.Half) + + +def test_solve_abs(): + n = Dummy('n') + raises(ValueError, lambda: solveset(Abs(x) - 1, x)) + assert solveset(Abs(x) - n, x, S.Reals).dummy_eq( + ConditionSet(x, Contains(n, Interval(0, oo)), {-n, n})) + assert solveset_real(Abs(x) - 2, x) == FiniteSet(-2, 2) + assert solveset_real(Abs(x) + 2, x) is S.EmptySet + assert solveset_real(Abs(x + 3) - 2*Abs(x - 3), x) == \ + FiniteSet(1, 9) + assert solveset_real(2*Abs(x) - Abs(x - 1), x) == \ + FiniteSet(-1, Rational(1, 3)) + + sol = ConditionSet( + x, + And( + Contains(b, Interval(0, oo)), + Contains(a + b, Interval(0, oo)), + Contains(a - b, Interval(0, oo))), + FiniteSet(-a - b - 3, -a + b - 3, a - b - 3, a + b - 3)) + eq = Abs(Abs(x + 3) - a) - b + assert invert_real(eq, 0, x)[1] == sol + reps = {a: 3, b: 1} + eqab = eq.subs(reps) + for si in sol.subs(reps): + assert not eqab.subs(x, si) + assert dumeq(solveset(Eq(sin(Abs(x)), 1), x, domain=S.Reals), Union( + Intersection(Interval(0, oo), Union( + Intersection(ImageSet(Lambda(n, 2*n*pi + 3*pi/2), S.Integers), + Interval(-oo, 0)), + Intersection(ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers), + Interval(0, oo)))))) + + +def test_issue_9824(): + assert dumeq(solveset(sin(x)**2 - 2*sin(x) + 1, x), ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers)) + assert dumeq(solveset(cos(x)**2 - 2*cos(x) + 1, x), ImageSet(Lambda(n, 2*n*pi), S.Integers)) + + +def test_issue_9565(): + assert solveset_real(Abs((x - 1)/(x - 5)) <= Rational(1, 3), x) == Interval(-1, 2) + + +def test_issue_10069(): + eq = abs(1/(x - 1)) - 1 > 0 + assert solveset_real(eq, x) == Union( + Interval.open(0, 1), Interval.open(1, 2)) + + +def test_real_imag_splitting(): + a, b = symbols('a b', real=True) + assert solveset_real(sqrt(a**2 - b**2) - 3, a) == \ + FiniteSet(-sqrt(b**2 + 9), sqrt(b**2 + 9)) + assert solveset_real(sqrt(a**2 + b**2) - 3, a) != \ + S.EmptySet + + +def test_units(): + assert solveset_real(1/x - 1/(2*cm), x) == FiniteSet(2*cm) + + +def test_solve_only_exp_1(): + y = Symbol('y', positive=True) + assert solveset_real(exp(x) - y, x) == FiniteSet(log(y)) + assert solveset_real(exp(x) + exp(-x) - 4, x) == \ + FiniteSet(log(-sqrt(3) + 2), log(sqrt(3) + 2)) + assert solveset_real(exp(x) + exp(-x) - y, x) != S.EmptySet + + +def test_atan2(): + # The .inverse() method on atan2 works only if x.is_real is True and the + # second argument is a real constant + assert solveset_real(atan2(x, 2) - pi/3, x) == FiniteSet(2*sqrt(3)) + + +def test_piecewise_solveset(): + eq = Piecewise((x - 2, Gt(x, 2)), (2 - x, True)) - 3 + assert set(solveset_real(eq, x)) == set(FiniteSet(-1, 5)) + + absxm3 = Piecewise( + (x - 3, 0 <= x - 3), + (3 - x, 0 > x - 3)) + y = Symbol('y', positive=True) + assert solveset_real(absxm3 - y, x) == FiniteSet(-y + 3, y + 3) + + f = Piecewise(((x - 2)**2, x >= 0), (0, True)) + assert solveset(f, x, domain=S.Reals) == Union(FiniteSet(2), Interval(-oo, 0, True, True)) + + assert solveset( + Piecewise((x + 1, x > 0), (I, True)) - I, x, S.Reals + ) == Interval(-oo, 0) + + assert solveset(Piecewise((x - 1, Ne(x, I)), (x, True)), x) == FiniteSet(1) + + # issue 19718 + g = Piecewise((1, x > 10), (0, True)) + assert solveset(g > 0, x, S.Reals) == Interval.open(10, oo) + + from sympy.logic.boolalg import BooleanTrue + f = BooleanTrue() + assert solveset(f, x, domain=Interval(-3, 10)) == Interval(-3, 10) + + # issue 20552 + f = Piecewise((0, Eq(x, 0)), (x**2/Abs(x), True)) + g = Piecewise((0, Eq(x, pi)), ((x - pi)/sin(x), True)) + assert solveset(f, x, domain=S.Reals) == FiniteSet(0) + assert solveset(g) == FiniteSet(pi) + + +def test_solveset_complex_polynomial(): + assert solveset_complex(a*x**2 + b*x + c, x) == \ + FiniteSet(-b/(2*a) - sqrt(-4*a*c + b**2)/(2*a), + -b/(2*a) + sqrt(-4*a*c + b**2)/(2*a)) + + assert solveset_complex(x - y**3, y) == FiniteSet( + (-x**Rational(1, 3))/2 + I*sqrt(3)*x**Rational(1, 3)/2, + x**Rational(1, 3), + (-x**Rational(1, 3))/2 - I*sqrt(3)*x**Rational(1, 3)/2) + + assert solveset_complex(x + 1/x - 1, x) == \ + FiniteSet(S.Half + I*sqrt(3)/2, S.Half - I*sqrt(3)/2) + + +def test_sol_zero_complex(): + assert solveset_complex(0, x) is S.Complexes + + +def test_solveset_complex_rational(): + assert solveset_complex((x - 1)*(x - I)/(x - 3), x) == \ + FiniteSet(1, I) + + assert solveset_complex((x - y**3)/((y**2)*sqrt(1 - y**2)), x) == \ + FiniteSet(y**3) + assert solveset_complex(-x**2 - I, x) == \ + FiniteSet(-sqrt(2)/2 + sqrt(2)*I/2, sqrt(2)/2 - sqrt(2)*I/2) + + +def test_solve_quintics(): + skip("This test is too slow") + f = x**5 - 110*x**3 - 55*x**2 + 2310*x + 979 + s = solveset_complex(f, x) + for root in s: + res = f.subs(x, root.n()).n() + assert tn(res, 0) + + f = x**5 + 15*x + 12 + s = solveset_complex(f, x) + for root in s: + res = f.subs(x, root.n()).n() + assert tn(res, 0) + + +def test_solveset_complex_exp(): + assert dumeq(solveset_complex(exp(x) - 1, x), + imageset(Lambda(n, I*2*n*pi), S.Integers)) + assert dumeq(solveset_complex(exp(x) - I, x), + imageset(Lambda(n, I*(2*n*pi + pi/2)), S.Integers)) + assert solveset_complex(1/exp(x), x) == S.EmptySet + assert dumeq(solveset_complex(sinh(x).rewrite(exp), x), + imageset(Lambda(n, n*pi*I), S.Integers)) + + +def test_solveset_real_exp(): + assert solveset(Eq((-2)**x, 4), x, S.Reals) == FiniteSet(2) + assert solveset(Eq(-2**x, 4), x, S.Reals) == S.EmptySet + assert solveset(Eq((-3)**x, 27), x, S.Reals) == S.EmptySet + assert solveset(Eq((-5)**(x+1), 625), x, S.Reals) == FiniteSet(3) + assert solveset(Eq(2**(x-3), -16), x, S.Reals) == S.EmptySet + assert solveset(Eq((-3)**(x - 3), -3**39), x, S.Reals) == FiniteSet(42) + assert solveset(Eq(2**x, y), x, S.Reals) == Intersection(S.Reals, FiniteSet(log(y)/log(2))) + + assert invert_real((-2)**(2*x) - 16, 0, x) == (x, FiniteSet(2)) + + +def test_solve_complex_log(): + assert solveset_complex(log(x), x) == FiniteSet(1) + assert solveset_complex(1 - log(a + 4*x**2), x) == \ + FiniteSet(-sqrt(-a + E)/2, sqrt(-a + E)/2) + + +def test_solve_complex_sqrt(): + assert solveset_complex(sqrt(5*x + 6) - 2 - x, x) == \ + FiniteSet(-S.One, S(2)) + assert solveset_complex(sqrt(5*x + 6) - (2 + 2*I) - x, x) == \ + FiniteSet(-S(2), 3 - 4*I) + assert solveset_complex(4*x*(1 - a * sqrt(x)), x) == \ + FiniteSet(S.Zero, 1 / a ** 2) + + +def test_solveset_complex_tan(): + s = solveset_complex(tan(x).rewrite(exp), x) + assert dumeq(s, imageset(Lambda(n, pi*n), S.Integers) - \ + imageset(Lambda(n, pi*n + pi/2), S.Integers)) + + +@_both_exp_pow +def test_solve_trig(): + assert dumeq(solveset_real(sin(x), x), + Union(imageset(Lambda(n, 2*pi*n), S.Integers), + imageset(Lambda(n, 2*pi*n + pi), S.Integers))) + + assert dumeq(solveset_real(sin(x) - 1, x), + imageset(Lambda(n, 2*pi*n + pi/2), S.Integers)) + + assert dumeq(solveset_real(cos(x), x), + Union(imageset(Lambda(n, 2*pi*n + pi/2), S.Integers), + imageset(Lambda(n, 2*pi*n + pi*Rational(3, 2)), S.Integers))) + + assert dumeq(solveset_real(sin(x) + cos(x), x), + Union(imageset(Lambda(n, 2*n*pi + pi*Rational(3, 4)), S.Integers), + imageset(Lambda(n, 2*n*pi + pi*Rational(7, 4)), S.Integers))) + + assert solveset_real(sin(x)**2 + cos(x)**2, x) == S.EmptySet + + assert dumeq(solveset_complex(cos(x) - S.Half, x), + Union(imageset(Lambda(n, 2*n*pi + pi*Rational(5, 3)), S.Integers), + imageset(Lambda(n, 2*n*pi + pi/3), S.Integers))) + + assert dumeq(solveset(sin(y + a) - sin(y), a, domain=S.Reals), + ConditionSet(a, (S(-1) <= sin(y)) & (sin(y) <= S(1)), Union( + ImageSet(Lambda(n, 2*n*pi - y + asin(sin(y))), S.Integers), + ImageSet(Lambda(n, 2*n*pi - y - asin(sin(y)) + pi), S.Integers)))) + + assert dumeq(solveset_real(sin(2*x)*cos(x) + cos(2*x)*sin(x)-1, x), + ImageSet(Lambda(n, n*pi*Rational(2, 3) + pi/6), S.Integers)) + + assert dumeq(solveset_real(2*tan(x)*sin(x) + 1, x), Union( + ImageSet(Lambda(n, 2*n*pi + atan(sqrt(2)*sqrt(-1 + sqrt(17))/ + (1 - sqrt(17))) + pi), S.Integers), + ImageSet(Lambda(n, 2*n*pi - atan(sqrt(2)*sqrt(-1 + sqrt(17))/ + (1 - sqrt(17))) + pi), S.Integers))) + + assert dumeq(solveset_real(cos(2*x)*cos(4*x) - 1, x), + ImageSet(Lambda(n, n*pi), S.Integers)) + + assert dumeq(solveset(sin(x/10) + Rational(3, 4)), Union( + ImageSet(Lambda(n, 20*n*pi - 10*asin(S(3)/4) + 20*pi), S.Integers), + ImageSet(Lambda(n, 20*n*pi + 10*asin(S(3)/4) + 10*pi), S.Integers))) + + assert dumeq(solveset(cos(x/15) + cos(x/5)), Union( + ImageSet(Lambda(n, 30*n*pi + 15*pi/2), S.Integers), + ImageSet(Lambda(n, 30*n*pi + 45*pi/2), S.Integers), + ImageSet(Lambda(n, 30*n*pi + 75*pi/4), S.Integers), + ImageSet(Lambda(n, 30*n*pi + 45*pi/4), S.Integers), + ImageSet(Lambda(n, 30*n*pi + 105*pi/4), S.Integers), + ImageSet(Lambda(n, 30*n*pi + 15*pi/4), S.Integers))) + + assert dumeq(solveset(sec(sqrt(2)*x/3) + 5), Union( + ImageSet(Lambda(n, 3*sqrt(2)*(2*n*pi - asec(-5))/2), S.Integers), + ImageSet(Lambda(n, 3*sqrt(2)*(2*n*pi + asec(-5))/2), S.Integers))) + + assert dumeq(simplify(solveset(tan(pi*x) - cot(pi/2*x))), Union( + ImageSet(Lambda(n, 4*n + 1), S.Integers), + ImageSet(Lambda(n, 4*n + 3), S.Integers), + ImageSet(Lambda(n, 4*n + Rational(7, 3)), S.Integers), + ImageSet(Lambda(n, 4*n + Rational(5, 3)), S.Integers), + ImageSet(Lambda(n, 4*n + Rational(11, 3)), S.Integers), + ImageSet(Lambda(n, 4*n + Rational(1, 3)), S.Integers))) + + assert dumeq(solveset(cos(9*x)), Union( + ImageSet(Lambda(n, 2*n*pi/9 + pi/18), S.Integers), + ImageSet(Lambda(n, 2*n*pi/9 + pi/6), S.Integers))) + + assert dumeq(solveset(sin(8*x) + cot(12*x), x, S.Reals), Union( + ImageSet(Lambda(n, n*pi/2 + pi/8), S.Integers), + ImageSet(Lambda(n, n*pi/2 + 3*pi/8), S.Integers), + ImageSet(Lambda(n, n*pi/2 + 5*pi/16), S.Integers), + ImageSet(Lambda(n, n*pi/2 + 3*pi/16), S.Integers), + ImageSet(Lambda(n, n*pi/2 + 7*pi/16), S.Integers), + ImageSet(Lambda(n, n*pi/2 + pi/16), S.Integers))) + + # This is the only remaining solveset test that actually ends up being solved + # by _solve_trig2(). All others are handled by the improved _solve_trig1. + assert dumeq(solveset_real(2*cos(x)*cos(2*x) - 1, x), + Union(ImageSet(Lambda(n, 2*n*pi + 2*atan(sqrt(-2*2**Rational(1, 3)*(67 + + 9*sqrt(57))**Rational(2, 3) + 8*2**Rational(2, 3) + 11*(67 + + 9*sqrt(57))**Rational(1, 3))/(3*(67 + 9*sqrt(57))**Rational(1, 6)))), S.Integers), + ImageSet(Lambda(n, 2*n*pi - 2*atan(sqrt(-2*2**Rational(1, 3)*(67 + + 9*sqrt(57))**Rational(2, 3) + 8*2**Rational(2, 3) + 11*(67 + + 9*sqrt(57))**Rational(1, 3))/(3*(67 + 9*sqrt(57))**Rational(1, 6))) + + 2*pi), S.Integers))) + + # issue #16870 + assert dumeq(simplify(solveset(sin(x/180*pi) - S.Half, x, S.Reals)), Union( + ImageSet(Lambda(n, 360*n + 150), S.Integers), + ImageSet(Lambda(n, 360*n + 30), S.Integers))) + + +def test_solve_trig_hyp_by_inversion(): + n = Dummy('n') + assert solveset_real(sin(2*x + 3) - S(1)/2, x).dummy_eq(Union( + ImageSet(Lambda(n, n*pi - S(3)/2 + 13*pi/12), S.Integers), + ImageSet(Lambda(n, n*pi - S(3)/2 + 17*pi/12), S.Integers))) + assert solveset_complex(sin(2*x + 3) - S(1)/2, x).dummy_eq(Union( + ImageSet(Lambda(n, n*pi - S(3)/2 + 13*pi/12), S.Integers), + ImageSet(Lambda(n, n*pi - S(3)/2 + 17*pi/12), S.Integers))) + assert solveset_real(tan(x) - tan(pi/10), x).dummy_eq( + ImageSet(Lambda(n, n*pi + pi/10), S.Integers)) + assert solveset_complex(tan(x) - tan(pi/10), x).dummy_eq( + ImageSet(Lambda(n, n*pi + pi/10), S.Integers)) + + assert solveset_real(3*cosh(2*x) - 5, x) == FiniteSet( + -acosh(S(5)/3)/2, acosh(S(5)/3)/2) + assert solveset_complex(3*cosh(2*x) - 5, x).dummy_eq(Union( + ImageSet(Lambda(n, n*I*pi - acosh(S(5)/3)/2), S.Integers), + ImageSet(Lambda(n, n*I*pi + acosh(S(5)/3)/2), S.Integers))) + assert solveset_real(sinh(x - 3) - 2, x) == FiniteSet( + asinh(2) + 3) + assert solveset_complex(sinh(x - 3) - 2, x).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*I*pi + asinh(2) + 3), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi - asinh(2) + 3 + I*pi), S.Integers))) + + assert solveset_real(cos(sinh(x))-cos(pi/12), x).dummy_eq(Union( + ImageSet(Lambda(n, asinh(2*n*pi + pi/12)), S.Integers), + ImageSet(Lambda(n, asinh(2*n*pi + 23*pi/12)), S.Integers))) + assert solveset(cos(sinh(x))-cos(pi/12), x, Interval(2,3)) == \ + FiniteSet(asinh(23*pi/12), asinh(25*pi/12)) + assert solveset_real(cosh(x**2-1)-2, x) == FiniteSet( + -sqrt(1 + acosh(2)), sqrt(1 + acosh(2))) + + assert solveset_real(sin(x) - 2, x) == S.EmptySet # issue #17334 + assert solveset_real(cos(x) + 2, x) == S.EmptySet + assert solveset_real(sec(x), x) == S.EmptySet + assert solveset_real(csc(x), x) == S.EmptySet + assert solveset_real(cosh(x) + 1, x) == S.EmptySet + assert solveset_real(coth(x), x) == S.EmptySet + assert solveset_real(sech(x) - 2, x) == S.EmptySet + assert solveset_real(sech(x), x) == S.EmptySet + assert solveset_real(tanh(x) + 1, x) == S.EmptySet + assert solveset_complex(tanh(x), 1) == S.EmptySet + assert solveset_complex(coth(x), -1) == S.EmptySet + assert solveset_complex(sech(x), 0) == S.EmptySet + assert solveset_complex(csch(x), 0) == S.EmptySet + + assert solveset_real(abs(csch(x)) - 3, x) == FiniteSet(-acsch(3), acsch(3)) + + assert solveset_real(tanh(x**2 - 1) - exp(-9), x) == FiniteSet( + -sqrt(atanh(exp(-9)) + 1), sqrt(atanh(exp(-9)) + 1)) + + assert solveset_real(coth(log(x)) + 2, x) == FiniteSet(exp(-acoth(2))) + assert solveset_real(coth(exp(x)) + 2, x) == S.EmptySet + + assert solveset_complex(sinh(x) - I/2, x).dummy_eq(Union( + ImageSet(Lambda(n, 2*I*pi*n + 5*I*pi/6), S.Integers), + ImageSet(Lambda(n, 2*I*pi*n + I*pi/6), S.Integers))) + assert solveset_complex(sinh(x/10) + Rational(3, 4), x).dummy_eq(Union( + ImageSet(Lambda(n, 20*n*I*pi - 10*asinh(S(3)/4)), S.Integers), + ImageSet(Lambda(n, 20*n*I*pi + 10*asinh(S(3)/4) + 10*I*pi), S.Integers))) + assert solveset_complex(sech(sqrt(2)*x/3) + 5, x).dummy_eq(Union( + ImageSet(Lambda(n, 3*sqrt(2)*(2*n*I*pi - asech(-5))/2), S.Integers), + ImageSet(Lambda(n, 3*sqrt(2)*(2*n*I*pi + asech(-5))/2), S.Integers))) + assert solveset_complex(cosh(9*x), x).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*I*pi/9 + I*pi/18), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi/9 + I*pi/6), S.Integers))) + + eq = (x**5 -4*x + 1).subs(x, coth(z)) + assert solveset(eq, z, S.Complexes).dummy_eq(Union( + ImageSet(Lambda(n, n*I*pi + acoth(CRootOf(x**5 -4*x + 1, 0))), S.Integers), + ImageSet(Lambda(n, n*I*pi + acoth(CRootOf(x**5 -4*x + 1, 1))), S.Integers), + ImageSet(Lambda(n, n*I*pi + acoth(CRootOf(x**5 -4*x + 1, 2))), S.Integers), + ImageSet(Lambda(n, n*I*pi + acoth(CRootOf(x**5 -4*x + 1, 3))), S.Integers), + ImageSet(Lambda(n, n*I*pi + acoth(CRootOf(x**5 -4*x + 1, 4))), S.Integers))) + assert solveset(eq, z, S.Reals) == FiniteSet( + acoth(CRootOf(x**5 - 4*x + 1, 0)), acoth(CRootOf(x**5 - 4*x + 1, 2))) + + eq = ((x-sqrt(3)/2)*(x+2)).expand().subs(x, cos(x)) + assert solveset(eq, x, S.Complexes).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*pi - acos(-2)), S.Integers), + ImageSet(Lambda(n, 2*n*pi + acos(-2)), S.Integers), + ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers), + ImageSet(Lambda(n, 2*n*pi + 11*pi/6), S.Integers))) + assert solveset(eq, x, S.Reals).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers), + ImageSet(Lambda(n, 2*n*pi + 11*pi/6), S.Integers))) + + assert solveset((1+sec(sqrt(3)*x+4)**2)/(1-sec(sqrt(3)*x+4))).dummy_eq(Union( + ImageSet(Lambda(n, sqrt(3)*(2*n*pi - 4 - asec(I))/3), S.Integers), + ImageSet(Lambda(n, sqrt(3)*(2*n*pi - 4 + asec(I))/3), S.Integers), + ImageSet(Lambda(n, sqrt(3)*(2*n*pi - 4 - asec(-I))/3), S.Integers), + ImageSet(Lambda(n, sqrt(3)*(2*n*pi - 4 + asec(-I))/3), S.Integers))) + + assert all_close(solveset(tan(3.14*x)**(S(3)/2)-5.678, x, Interval(0, 3)), + FiniteSet(0.403301114561067, 0.403301114561067 + 0.318471337579618*pi, + 0.403301114561067 + 0.636942675159236*pi)) + + +def test_old_trig_issues(): + # issues #9606 / #9531: + assert solveset(sinh(x), x, S.Reals) == FiniteSet(0) + assert solveset(sinh(x), x, S.Complexes).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*I*pi), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi + I*pi), S.Integers))) + + # issues #11218 / #18427 + assert solveset(sin(pi*x), x, S.Reals).dummy_eq(Union( + ImageSet(Lambda(n, (2*n*pi + pi)/pi), S.Integers), + ImageSet(Lambda(n, 2*n), S.Integers))) + assert solveset(sin(pi*x), x).dummy_eq(Union( + ImageSet(Lambda(n, (2*n*pi + pi)/pi), S.Integers), + ImageSet(Lambda(n, 2*n), S.Integers))) + + # issue #17543 + assert solveset(I*cot(8*x - 8*E), x).dummy_eq( + ImageSet(Lambda(n, pi*n/8 - 13*pi/16 + E), S.Integers)) + + # issue #20798 + assert all_close(solveset(cos(2*x) - 0.5, x, Interval(0, 2*pi)), FiniteSet( + 0.523598775598299, -0.523598775598299 + pi, + -0.523598775598299 + 2*pi, 0.523598775598299 + pi)) + sol = Union(ImageSet(Lambda(n, n*pi - 0.523598775598299), S.Integers), + ImageSet(Lambda(n, n*pi + 0.523598775598299), S.Integers)) + ret = solveset(cos(2*x) - 0.5, x, S.Reals) + # replace Dummy n by the regular Symbol n to allow all_close comparison. + ret = ret.subs(ret.atoms(Dummy).pop(), n) + assert all_close(ret, sol) + ret = solveset(cos(2*x) - 0.5, x, S.Complexes) + ret = ret.subs(ret.atoms(Dummy).pop(), n) + assert all_close(ret, sol) + + # issue #21296 / #17667 + assert solveset(tan(x)-sqrt(2), x, Interval(0, pi/2)) == FiniteSet(atan(sqrt(2))) + assert solveset(tan(x)-pi, x, Interval(0, pi/2)) == FiniteSet(atan(pi)) + + # issue #17667 + # not yet working properly: + # solveset(cos(x)-y, x, Interval(0, pi)) + assert solveset(cos(x)-y, x, S.Reals).dummy_eq( + ConditionSet(x,(S(-1) <= y) & (y <= S(1)), Union( + ImageSet(Lambda(n, 2*n*pi - acos(y)), S.Integers), + ImageSet(Lambda(n, 2*n*pi + acos(y)), S.Integers)))) + + # issue #17579 + # Valid result, but the intersection could potentially be simplified. + assert solveset(sin(log(x)), x, Interval(0,1, True, False)).dummy_eq( + Union(Intersection(ImageSet(Lambda(n, exp(2*n*pi)), S.Integers), Interval.Lopen(0, 1)), + Intersection(ImageSet(Lambda(n, exp(2*n*pi + pi)), S.Integers), Interval.Lopen(0, 1)))) + + # issue #17334 + assert solveset(sin(x) - sin(1), x, S.Reals).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*pi + 1), S.Integers), + ImageSet(Lambda(n, 2*n*pi - 1 + pi), S.Integers))) + assert solveset(sin(x) - sqrt(5)/3, x, S.Reals).dummy_eq(Union( + ImageSet(Lambda(n, 2*n*pi + asin(sqrt(5)/3)), S.Integers), + ImageSet(Lambda(n, 2*n*pi - asin(sqrt(5)/3) + pi), S.Integers))) + assert solveset(sinh(x)-cosh(2), x, S.Reals) == FiniteSet(asinh(cosh(2))) + + # issue 9825 + assert solveset(Eq(tan(x), y), x, domain=S.Reals).dummy_eq( + ConditionSet(x, (-oo < y) & (y < oo), + ImageSet(Lambda(n, n*pi + atan(y)), S.Integers))) + r = Symbol('r', real=True) + assert solveset(Eq(tan(x), r), x, domain=S.Reals).dummy_eq( + ImageSet(Lambda(n, n*pi + atan(r)), S.Integers)) + + +def test_solve_hyperbolic(): + # actual solver: _solve_trig1 + n = Dummy('n') + assert solveset(sinh(x) + cosh(x), x) == S.EmptySet + assert solveset(sinh(x) + cos(x), x) == ConditionSet(x, + Eq(cos(x) + sinh(x), 0), S.Complexes) + assert solveset_real(sinh(x) + sech(x), x) == FiniteSet( + log(sqrt(sqrt(5) - 2))) + assert solveset_real(cosh(2*x) + 2*sinh(x) - 5, x) == FiniteSet( + log(-2 + sqrt(5)), log(1 + sqrt(2))) + assert solveset_real((coth(x) + sinh(2*x))/cosh(x) - 3, x) == FiniteSet( + log(S.Half + sqrt(5)/2), log(1 + sqrt(2))) + assert solveset_real(cosh(x)*sinh(x) - 2, x) == FiniteSet( + log(4 + sqrt(17))/2) + assert solveset_real(sinh(x) + tanh(x) - 1, x) == FiniteSet( + log(sqrt(2)/2 + sqrt(-S(1)/2 + sqrt(2)))) + + assert dumeq(solveset_complex(sinh(x) + sech(x), x), Union( + ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(-2 + sqrt(5)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi/2) + log(sqrt(2 + sqrt(5)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi) + log(sqrt(-2 + sqrt(5)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi - pi/2) + log(sqrt(2 + sqrt(5)))), S.Integers))) + + assert dumeq(solveset(cosh(x/15) + cosh(x/5)), Union( + ImageSet(Lambda(n, 15*I*(2*n*pi + pi/2)), S.Integers), + ImageSet(Lambda(n, 15*I*(2*n*pi - pi/2)), S.Integers), + ImageSet(Lambda(n, 15*I*(2*n*pi - 3*pi/4)), S.Integers), + ImageSet(Lambda(n, 15*I*(2*n*pi + 3*pi/4)), S.Integers), + ImageSet(Lambda(n, 15*I*(2*n*pi - pi/4)), S.Integers), + ImageSet(Lambda(n, 15*I*(2*n*pi + pi/4)), S.Integers))) + + assert dumeq(solveset(tanh(pi*x) - coth(pi/2*x)), Union( + ImageSet(Lambda(n, 2*I*(2*n*pi + pi/2)/pi), S.Integers), + ImageSet(Lambda(n, 2*I*(2*n*pi - pi/2)/pi), S.Integers))) + + # issues #18490 / #19489 + assert solveset(cosh(x) + cosh(3*x) - cosh(5*x), x, S.Reals + ).dummy_eq(ConditionSet(x, + Eq(cosh(x) + cosh(3*x) - cosh(5*x), 0), S.Reals)) + assert solveset(sinh(8*x) + coth(12*x)).dummy_eq( + ConditionSet(x, Eq(sinh(8*x) + coth(12*x), 0), S.Complexes)) + + +def test_solve_trig_hyp_symbolic(): + # actual solver: invert_trig_hyp + assert dumeq(solveset(sin(a*x), x), ConditionSet(x, Ne(a, 0), Union( + ImageSet(Lambda(n, (2*n*pi + pi)/a), S.Integers), + ImageSet(Lambda(n, 2*n*pi/a), S.Integers)))) + + assert dumeq(solveset(cosh(x/a), x), ConditionSet(x, Ne(a, 0), Union( + ImageSet(Lambda(n, a*(2*n*I*pi + I*pi/2)), S.Integers), + ImageSet(Lambda(n, a*(2*n*I*pi + 3*I*pi/2)), S.Integers)))) + + assert dumeq(solveset(sin(2*sqrt(3)/3*a**2/(b*pi)*x) + + cos(4*sqrt(3)/3*a**2/(b*pi)*x), x), + ConditionSet(x, Ne(b, 0) & Ne(a**2, 0), Union( + ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi + pi/2)/(2*a**2)), S.Integers), + ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi - 5*pi/6)/(2*a**2)), S.Integers), + ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi - pi/6)/(2*a**2)), S.Integers)))) + + assert dumeq(solveset(cosh((a**2 + 1)*x) - 3, x), ConditionSet( + x, Ne(a**2 + 1, 0), Union( + ImageSet(Lambda(n, (2*n*I*pi - acosh(3))/(a**2 + 1)), S.Integers), + ImageSet(Lambda(n, (2*n*I*pi + acosh(3))/(a**2 + 1)), S.Integers)))) + + ar = Symbol('ar', real=True) + assert solveset(cosh((ar**2 + 1)*x) - 2, x, S.Reals) == FiniteSet( + -acosh(2)/(ar**2 + 1), acosh(2)/(ar**2 + 1)) + + # actual solver: _solve_trig1 + assert dumeq(simplify(solveset(cot((1 + I)*x) - cot((3 + 3*I)*x), x)), Union( + ImageSet(Lambda(n, pi*(1 - I)*(4*n + 1)/4), S.Integers), + ImageSet(Lambda(n, pi*(1 - I)*(4*n - 1)/4), S.Integers))) + + +def test_issue_9616(): + assert dumeq(solveset(sinh(x) + tanh(x) - 1, x), Union( + ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi - atan(sqrt(2)*sqrt(S.Half + sqrt(2))) + pi) + + log(sqrt(1 + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi) + log(-sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi - pi + atan(sqrt(2)*sqrt(S.Half + sqrt(2)))) + + log(sqrt(1 + sqrt(2)))), S.Integers))) + f1 = (sinh(x)).rewrite(exp) + f2 = (tanh(x)).rewrite(exp) + assert dumeq(solveset(f1 + f2 - 1, x), Union( + Complement(ImageSet( + Lambda(n, I*(2*n*pi + pi) + log(-sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)), + Complement(ImageSet(Lambda(n, I*(2*n*pi - pi + atan(sqrt(2)*sqrt(S.Half + sqrt(2)))) + + log(sqrt(1 + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)), + Complement(ImageSet(Lambda(n, I*(2*n*pi - atan(sqrt(2)*sqrt(S.Half + sqrt(2))) + pi) + + log(sqrt(1 + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)), + Complement( + ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers), + ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)))) + + +def test_solve_invalid_sol(): + assert 0 not in solveset_real(sin(x)/x, x) + assert 0 not in solveset_complex((exp(x) - 1)/x, x) + + +@XFAIL +def test_solve_trig_simplified(): + n = Dummy('n') + assert dumeq(solveset_real(sin(x), x), + imageset(Lambda(n, n*pi), S.Integers)) + + assert dumeq(solveset_real(cos(x), x), + imageset(Lambda(n, n*pi + pi/2), S.Integers)) + + assert dumeq(solveset_real(cos(x) + sin(x), x), + imageset(Lambda(n, n*pi - pi/4), S.Integers)) + + +@XFAIL +def test_solve_lambert(): + assert solveset_real(x*exp(x) - 1, x) == FiniteSet(LambertW(1)) + assert solveset_real(exp(x) + x, x) == FiniteSet(-LambertW(1)) + assert solveset_real(x + 2**x, x) == \ + FiniteSet(-LambertW(log(2))/log(2)) + + # issue 4739 + ans = solveset_real(3*x + 5 + 2**(-5*x + 3), x) + assert ans == FiniteSet(Rational(-5, 3) + + LambertW(-10240*2**Rational(1, 3)*log(2)/3)/(5*log(2))) + + eq = 2*(3*x + 4)**5 - 6*7**(3*x + 9) + result = solveset_real(eq, x) + ans = FiniteSet((log(2401) + + 5*LambertW(-log(7**(7*3**Rational(1, 5)/5))))/(3*log(7))/-1) + assert result == ans + assert solveset_real(eq.expand(), x) == result + + assert solveset_real(5*x - 1 + 3*exp(2 - 7*x), x) == \ + FiniteSet(Rational(1, 5) + LambertW(-21*exp(Rational(3, 5))/5)/7) + + assert solveset_real(2*x + 5 + log(3*x - 2), x) == \ + FiniteSet(Rational(2, 3) + LambertW(2*exp(Rational(-19, 3))/3)/2) + + assert solveset_real(3*x + log(4*x), x) == \ + FiniteSet(LambertW(Rational(3, 4))/3) + + assert solveset_real(x**x - 2) == FiniteSet(exp(LambertW(log(2)))) + + a = Symbol('a') + assert solveset_real(-a*x + 2*x*log(x), x) == FiniteSet(exp(a/2)) + a = Symbol('a', real=True) + assert solveset_real(a/x + exp(x/2), x) == \ + FiniteSet(2*LambertW(-a/2)) + assert solveset_real((a/x + exp(x/2)).diff(x), x) == \ + FiniteSet(4*LambertW(sqrt(2)*sqrt(a)/4)) + + # coverage test + assert solveset_real(tanh(x + 3)*tanh(x - 3) - 1, x) is S.EmptySet + + assert solveset_real((x**2 - 2*x + 1).subs(x, log(x) + 3*x), x) == \ + FiniteSet(LambertW(3*S.Exp1)/3) + assert solveset_real((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1), x) == \ + FiniteSet(LambertW(3*exp(-sqrt(2)))/3, LambertW(3*exp(sqrt(2)))/3) + assert solveset_real((x**2 - 2*x - 2).subs(x, log(x) + 3*x), x) == \ + FiniteSet(LambertW(3*exp(1 + sqrt(3)))/3, LambertW(3*exp(-sqrt(3) + 1))/3) + assert solveset_real(x*log(x) + 3*x + 1, x) == \ + FiniteSet(exp(-3 + LambertW(-exp(3)))) + eq = (x*exp(x) - 3).subs(x, x*exp(x)) + assert solveset_real(eq, x) == \ + FiniteSet(LambertW(3*exp(-LambertW(3)))) + + assert solveset_real(3*log(a**(3*x + 5)) + a**(3*x + 5), x) == \ + FiniteSet(-((log(a**5) + LambertW(Rational(1, 3)))/(3*log(a)))) + p = symbols('p', positive=True) + assert solveset_real(3*log(p**(3*x + 5)) + p**(3*x + 5), x) == \ + FiniteSet( + log((-3**Rational(1, 3) - 3**Rational(5, 6)*I)*LambertW(Rational(1, 3))**Rational(1, 3)/(2*p**Rational(5, 3)))/log(p), + log((-3**Rational(1, 3) + 3**Rational(5, 6)*I)*LambertW(Rational(1, 3))**Rational(1, 3)/(2*p**Rational(5, 3)))/log(p), + log((3*LambertW(Rational(1, 3))/p**5)**(1/(3*log(p)))),) # checked numerically + # check collection + b = Symbol('b') + eq = 3*log(a**(3*x + 5)) + b*log(a**(3*x + 5)) + a**(3*x + 5) + assert solveset_real(eq, x) == FiniteSet( + -((log(a**5) + LambertW(1/(b + 3)))/(3*log(a)))) + + # issue 4271 + assert solveset_real((a/x + exp(x/2)).diff(x, 2), x) == FiniteSet( + 6*LambertW((-1)**Rational(1, 3)*a**Rational(1, 3)/3)) + + assert solveset_real(x**3 - 3**x, x) == \ + FiniteSet(-3/log(3)*LambertW(-log(3)/3)) + assert solveset_real(3**cos(x) - cos(x)**3) == FiniteSet( + acos(-3*LambertW(-log(3)/3)/log(3))) + + assert solveset_real(x**2 - 2**x, x) == \ + solveset_real(-x**2 + 2**x, x) + + assert solveset_real(3*log(x) - x*log(3)) == FiniteSet( + -3*LambertW(-log(3)/3)/log(3), + -3*LambertW(-log(3)/3, -1)/log(3)) + + assert solveset_real(LambertW(2*x) - y) == FiniteSet( + y*exp(y)/2) + + +@XFAIL +def test_other_lambert(): + a = Rational(6, 5) + assert solveset_real(x**a - a**x, x) == FiniteSet( + a, -a*LambertW(-log(a)/a)/log(a)) + + +@_both_exp_pow +def test_solveset(): + f = Function('f') + raises(ValueError, lambda: solveset(x + y)) + assert solveset(x, 1) == S.EmptySet + assert solveset(f(1)**2 + y + 1, f(1) + ) == FiniteSet(-sqrt(-y - 1), sqrt(-y - 1)) + assert solveset(f(1)**2 - 1, f(1), S.Reals) == FiniteSet(-1, 1) + assert solveset(f(1)**2 + 1, f(1)) == FiniteSet(-I, I) + assert solveset(x - 1, 1) == FiniteSet(x) + assert solveset(sin(x) - cos(x), sin(x)) == FiniteSet(cos(x)) + + assert solveset(0, domain=S.Reals) == S.Reals + assert solveset(1) == S.EmptySet + assert solveset(True, domain=S.Reals) == S.Reals # issue 10197 + assert solveset(False, domain=S.Reals) == S.EmptySet + + assert solveset(exp(x) - 1, domain=S.Reals) == FiniteSet(0) + assert solveset(exp(x) - 1, x, S.Reals) == FiniteSet(0) + assert solveset(Eq(exp(x), 1), x, S.Reals) == FiniteSet(0) + assert solveset(exp(x) - 1, exp(x), S.Reals) == FiniteSet(1) + A = Indexed('A', x) + assert solveset(A - 1, A, S.Reals) == FiniteSet(1) + + assert solveset(x - 1 >= 0, x, S.Reals) == Interval(1, oo) + assert solveset(exp(x) - 1 >= 0, x, S.Reals) == Interval(0, oo) + + assert dumeq(solveset(exp(x) - 1, x), imageset(Lambda(n, 2*I*pi*n), S.Integers)) + assert dumeq(solveset(Eq(exp(x), 1), x), imageset(Lambda(n, 2*I*pi*n), + S.Integers)) + # issue 13825 + assert solveset(x**2 + f(0) + 1, x) == {-sqrt(-f(0) - 1), sqrt(-f(0) - 1)} + + # issue 19977 + assert solveset(atan(log(x)) > 0, x, domain=Interval.open(0, oo)) == Interval.open(1, oo) + + +@_both_exp_pow +def test_multi_exp(): + k1, k2, k3 = symbols('k1, k2, k3') + assert dumeq(solveset(exp(exp(x)) - 5, x),\ + imageset(Lambda(((k1, n),), I*(2*k1*pi + arg(2*n*I*pi + log(5))) + log(Abs(2*n*I*pi + log(5)))),\ + ProductSet(S.Integers, S.Integers))) + assert dumeq(solveset((d*exp(exp(a*x + b)) + c), x),\ + imageset(Lambda(x, (-b + x)/a), ImageSet(Lambda(((k1, n),), \ + I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))) + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d))))), \ + ProductSet(S.Integers, S.Integers)))) + + assert dumeq(solveset((d*exp(exp(exp(a*x + b))) + c), x),\ + imageset(Lambda(x, (-b + x)/a), ImageSet(Lambda(((k2, k1, n),), \ + I*(2*k2*pi + arg(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))) + \ + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))))) + log(Abs(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + \ + log(Abs(c/d)))) + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d))))))), \ + ProductSet(S.Integers, S.Integers, S.Integers)))) + + assert dumeq(solveset((d*exp(exp(exp(exp(a*x + b)))) + c), x),\ + ImageSet(Lambda(x, (-b + x)/a), ImageSet(Lambda(((k3, k2, k1, n),), \ + I*(2*k3*pi + arg(I*(2*k2*pi + arg(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))) + \ + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))))) + log(Abs(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + \ + log(Abs(c/d)))) + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))))))) + log(Abs(I*(2*k2*pi + \ + arg(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))) + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))))) + \ + log(Abs(I*(2*k1*pi + arg(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d)))) + log(Abs(I*(2*n*pi + arg(-c/d)) + log(Abs(c/d))))))))), \ + ProductSet(S.Integers, S.Integers, S.Integers, S.Integers)))) + + +def test__solveset_multi(): + from sympy.solvers.solveset import _solveset_multi + from sympy.sets import Reals + + # Basic univariate case: + assert _solveset_multi([x**2-1], [x], [S.Reals]) == FiniteSet((1,), (-1,)) + + # Linear systems of two equations + assert _solveset_multi([x+y, x+1], [x, y], [Reals, Reals]) == FiniteSet((-1, 1)) + assert _solveset_multi([x+y, x+1], [y, x], [Reals, Reals]) == FiniteSet((1, -1)) + assert _solveset_multi([x+y, x-y-1], [x, y], [Reals, Reals]) == FiniteSet((S(1)/2, -S(1)/2)) + assert _solveset_multi([x-1, y-2], [x, y], [Reals, Reals]) == FiniteSet((1, 2)) + # assert dumeq(_solveset_multi([x+y], [x, y], [Reals, Reals]), ImageSet(Lambda(x, (x, -x)), Reals)) + assert dumeq(_solveset_multi([x+y], [x, y], [Reals, Reals]), Union( + ImageSet(Lambda(((x,),), (x, -x)), ProductSet(Reals)), + ImageSet(Lambda(((y,),), (-y, y)), ProductSet(Reals)))) + assert _solveset_multi([x+y, x+y+1], [x, y], [Reals, Reals]) == S.EmptySet + assert _solveset_multi([x+y, x-y, x-1], [x, y], [Reals, Reals]) == S.EmptySet + assert _solveset_multi([x+y, x-y, x-1], [y, x], [Reals, Reals]) == S.EmptySet + + # Systems of three equations: + assert _solveset_multi([x+y+z-1, x+y-z-2, x-y-z-3], [x, y, z], [Reals, + Reals, Reals]) == FiniteSet((2, -S.Half, -S.Half)) + + # Nonlinear systems: + from sympy.abc import theta + assert _solveset_multi([x**2+y**2-2, x+y], [x, y], [Reals, Reals]) == FiniteSet((-1, 1), (1, -1)) + assert _solveset_multi([x**2-1, y], [x, y], [Reals, Reals]) == FiniteSet((1, 0), (-1, 0)) + #assert _solveset_multi([x**2-y**2], [x, y], [Reals, Reals]) == Union( + # ImageSet(Lambda(x, (x, -x)), Reals), ImageSet(Lambda(x, (x, x)), Reals)) + assert dumeq(_solveset_multi([x**2-y**2], [x, y], [Reals, Reals]), Union( + ImageSet(Lambda(((x,),), (x, -Abs(x))), ProductSet(Reals)), + ImageSet(Lambda(((x,),), (x, Abs(x))), ProductSet(Reals)), + ImageSet(Lambda(((y,),), (-Abs(y), y)), ProductSet(Reals)), + ImageSet(Lambda(((y,),), (Abs(y), y)), ProductSet(Reals)))) + assert _solveset_multi([r*cos(theta)-1, r*sin(theta)], [theta, r], + [Interval(0, pi), Interval(-1, 1)]) == FiniteSet((0, 1), (pi, -1)) + assert _solveset_multi([r*cos(theta)-1, r*sin(theta)], [r, theta], + [Interval(0, 1), Interval(0, pi)]) == FiniteSet((1, 0)) + assert _solveset_multi([r*cos(theta)-r, r*sin(theta)], [r, theta], + [Interval(0, 1), Interval(0, pi)]) == Union( + ImageSet(Lambda(((r,),), (r, 0)), + ImageSet(Lambda(r, (r,)), Interval(0, 1))), + ImageSet(Lambda(((theta,),), (0, theta)), + ImageSet(Lambda(theta, (theta,)), Interval(0, pi)))) + + +def test_conditionset(): + assert solveset(Eq(sin(x)**2 + cos(x)**2, 1), x, domain=S.Reals + ) is S.Reals + + assert solveset(Eq(x**2 + x*sin(x), 1), x, domain=S.Reals + ).dummy_eq(ConditionSet(x, Eq(x**2 + x*sin(x) - 1, 0), S.Reals)) + + assert dumeq(solveset(Eq(-I*(exp(I*x) - exp(-I*x))/2, 1), x + ), imageset(Lambda(n, 2*n*pi + pi/2), S.Integers)) + + assert solveset(x + sin(x) > 1, x, domain=S.Reals + ).dummy_eq(ConditionSet(x, x + sin(x) > 1, S.Reals)) + + assert solveset(Eq(sin(Abs(x)), x), x, domain=S.Reals + ).dummy_eq(ConditionSet(x, Eq(-x + sin(Abs(x)), 0), S.Reals)) + + assert solveset(y**x-z, x, S.Reals + ).dummy_eq(ConditionSet(x, Eq(y**x - z, 0), S.Reals)) + + +@XFAIL +def test_conditionset_equality(): + ''' Checking equality of different representations of ConditionSet''' + assert solveset(Eq(tan(x), y), x) == ConditionSet(x, Eq(tan(x), y), S.Complexes) + + +def test_solveset_domain(): + assert solveset(x**2 - x - 6, x, Interval(0, oo)) == FiniteSet(3) + assert solveset(x**2 - 1, x, Interval(0, oo)) == FiniteSet(1) + assert solveset(x**4 - 16, x, Interval(0, 10)) == FiniteSet(2) + + +def test_improve_coverage(): + solution = solveset(exp(x) + sin(x), x, S.Reals) + unsolved_object = ConditionSet(x, Eq(exp(x) + sin(x), 0), S.Reals) + assert solution.dummy_eq(unsolved_object) + + +def test_issue_9522(): + expr1 = Eq(1/(x**2 - 4) + x, 1/(x**2 - 4) + 2) + expr2 = Eq(1/x + x, 1/x) + + assert solveset(expr1, x, S.Reals) is S.EmptySet + assert solveset(expr2, x, S.Reals) is S.EmptySet + + +def test_solvify(): + assert solvify(x**2 + 10, x, S.Reals) == [] + assert solvify(x**3 + 1, x, S.Complexes) == [-1, S.Half - sqrt(3)*I/2, + S.Half + sqrt(3)*I/2] + assert solvify(log(x), x, S.Reals) == [1] + assert solvify(cos(x), x, S.Reals) == [pi/2, pi*Rational(3, 2)] + assert solvify(sin(x) + 1, x, S.Reals) == [pi*Rational(3, 2)] + raises(NotImplementedError, lambda: solvify(sin(exp(x)), x, S.Complexes)) + + +def test_solvify_piecewise(): + p1 = Piecewise((0, x < -1), (x**2, x <= 1), (log(x), True)) + p2 = Piecewise((0, x < -10), (x**2 + 5*x - 6, x >= -9)) + p3 = Piecewise((0, Eq(x, 0)), (x**2/Abs(x), True)) + p4 = Piecewise((0, Eq(x, pi)), ((x - pi)/sin(x), True)) + + # issue 21079 + assert solvify(p1, x, S.Reals) == [0] + assert solvify(p2, x, S.Reals) == [-6, 1] + assert solvify(p3, x, S.Reals) == [0] + assert solvify(p4, x, S.Reals) == [pi] + + +def test_abs_invert_solvify(): + + x = Symbol('x',positive=True) + assert solvify(sin(Abs(x)), x, S.Reals) == [0, pi] + x = Symbol('x') + assert solvify(sin(Abs(x)), x, S.Reals) is None + + +def test_linear_eq_to_matrix(): + assert linear_eq_to_matrix(0, x) == (Matrix([[0]]), Matrix([[0]])) + assert linear_eq_to_matrix(1, x) == (Matrix([[0]]), Matrix([[-1]])) + + # integer coefficients + eqns1 = [2*x + y - 2*z - 3, x - y - z, x + y + 3*z - 12] + eqns2 = [Eq(3*x + 2*y - z, 1), Eq(2*x - 2*y + 4*z, -2), -2*x + y - 2*z] + + A, B = linear_eq_to_matrix(eqns1, x, y, z) + assert A == Matrix([[2, 1, -2], [1, -1, -1], [1, 1, 3]]) + assert B == Matrix([[3], [0], [12]]) + + A, B = linear_eq_to_matrix(eqns2, x, y, z) + assert A == Matrix([[3, 2, -1], [2, -2, 4], [-2, 1, -2]]) + assert B == Matrix([[1], [-2], [0]]) + + # Pure symbolic coefficients + eqns3 = [a*b*x + b*y + c*z - d, e*x + d*x + f*y + g*z - h, i*x + j*y + k*z - l] + A, B = linear_eq_to_matrix(eqns3, x, y, z) + assert A == Matrix([[a*b, b, c], [d + e, f, g], [i, j, k]]) + assert B == Matrix([[d], [h], [l]]) + + # raise Errors if + # 1) no symbols are given + raises(ValueError, lambda: linear_eq_to_matrix(eqns3)) + # 2) there are duplicates + raises(ValueError, lambda: linear_eq_to_matrix(eqns3, [x, x, y])) + # 3) a nonlinear term is detected in the original expression + raises(NonlinearError, lambda: linear_eq_to_matrix(Eq(1/x + x, 1/x), [x])) + raises(NonlinearError, lambda: linear_eq_to_matrix([x**2], [x])) + raises(NonlinearError, lambda: linear_eq_to_matrix([x*y], [x, y])) + # 4) Eq being used to represent equations autoevaluates + # (use unevaluated Eq instead) + raises(ValueError, lambda: linear_eq_to_matrix(Eq(x, x), x)) + raises(ValueError, lambda: linear_eq_to_matrix(Eq(x, x + 1), x)) + + + # if non-symbols are passed, the user is responsible for interpreting + assert linear_eq_to_matrix([x], [1/x]) == (Matrix([[0]]), Matrix([[-x]])) + + # issue 15195 + assert linear_eq_to_matrix(x + y*(z*(3*x + 2) + 3), x) == ( + Matrix([[3*y*z + 1]]), Matrix([[-y*(2*z + 3)]])) + assert linear_eq_to_matrix(Matrix( + [[a*x + b*y - 7], [5*x + 6*y - c]]), x, y) == ( + Matrix([[a, b], [5, 6]]), Matrix([[7], [c]])) + + # issue 15312 + assert linear_eq_to_matrix(Eq(x + 2, 1), x) == ( + Matrix([[1]]), Matrix([[-1]])) + + # issue 25423 + raises(TypeError, lambda: linear_eq_to_matrix([], {x, y})) + raises(TypeError, lambda: linear_eq_to_matrix([x + y], {x, y})) + raises(ValueError, lambda: linear_eq_to_matrix({x + y}, (x, y))) + + +def test_issue_16577(): + assert linear_eq_to_matrix(Eq(a*(2*x + 3*y) + 4*y, 5), x, y) == ( + Matrix([[2*a, 3*a + 4]]), Matrix([[5]])) + + +def test_issue_10085(): + assert invert_real(exp(x),0,x) == (x, S.EmptySet) + + +def test_linsolve(): + x1, x2, x3, x4 = symbols('x1, x2, x3, x4') + + # Test for different input forms + + M = Matrix([[1, 2, 1, 1, 7], [1, 2, 2, -1, 12], [2, 4, 0, 6, 4]]) + system1 = A, B = M[:, :-1], M[:, -1] + Eqns = [x1 + 2*x2 + x3 + x4 - 7, x1 + 2*x2 + 2*x3 - x4 - 12, + 2*x1 + 4*x2 + 6*x4 - 4] + + sol = FiniteSet((-2*x2 - 3*x4 + 2, x2, 2*x4 + 5, x4)) + assert linsolve(Eqns, (x1, x2, x3, x4)) == sol + assert linsolve(Eqns, *(x1, x2, x3, x4)) == sol + assert linsolve(system1, (x1, x2, x3, x4)) == sol + assert linsolve(system1, *(x1, x2, x3, x4)) == sol + # issue 9667 - symbols can be Dummy symbols + x1, x2, x3, x4 = symbols('x:4', cls=Dummy) + assert linsolve(system1, x1, x2, x3, x4) == FiniteSet( + (-2*x2 - 3*x4 + 2, x2, 2*x4 + 5, x4)) + + # raise ValueError for garbage value + raises(ValueError, lambda: linsolve(Eqns)) + raises(ValueError, lambda: linsolve(x1)) + raises(ValueError, lambda: linsolve(x1, x2)) + raises(ValueError, lambda: linsolve((A,), x1, x2)) + raises(ValueError, lambda: linsolve(A, B, x1, x2)) + raises(ValueError, lambda: linsolve([x1], x1, x1)) + raises(ValueError, lambda: linsolve([x1], (i for i in (x1, x1)))) + + #raise ValueError if equations are non-linear in given variables + raises(NonlinearError, lambda: linsolve([x + y - 1, x ** 2 + y - 3], [x, y])) + raises(NonlinearError, lambda: linsolve([cos(x) + y, x + y], [x, y])) + assert linsolve([x + z - 1, x ** 2 + y - 3], [z, y]) == {(-x + 1, -x**2 + 3)} + + # Fully symbolic test + A = Matrix([[a, b], [c, d]]) + B = Matrix([[e], [g]]) + system2 = (A, B) + sol = FiniteSet(((-b*g + d*e)/(a*d - b*c), (a*g - c*e)/(a*d - b*c))) + assert linsolve(system2, [x, y]) == sol + + # No solution + A = Matrix([[1, 2, 3], [2, 4, 6], [3, 6, 9]]) + B = Matrix([0, 0, 1]) + assert linsolve((A, B), (x, y, z)) is S.EmptySet + + # Issue #10056 + A, B, J1, J2 = symbols('A B J1 J2') + Augmatrix = Matrix([ + [2*I*J1, 2*I*J2, -2/J1], + [-2*I*J2, -2*I*J1, 2/J2], + [0, 2, 2*I/(J1*J2)], + [2, 0, 0], + ]) + + assert linsolve(Augmatrix, A, B) == FiniteSet((0, I/(J1*J2))) + + # Issue #10121 - Assignment of free variables + Augmatrix = Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, 0]]) + assert linsolve(Augmatrix, a, b, c, d, e) == FiniteSet((a, 0, c, 0, e)) + #raises(IndexError, lambda: linsolve(Augmatrix, a, b, c)) + + x0, x1, x2, _x0 = symbols('tau0 tau1 tau2 _tau0') + assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]]) + ) == FiniteSet((x0, 0, x1, _x0, x2)) + x0, x1, x2, _x0 = symbols('tau00 tau01 tau02 tau0') + assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]]) + ) == FiniteSet((x0, 0, x1, _x0, x2)) + x0, x1, x2, _x0 = symbols('tau00 tau01 tau02 tau1') + assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]]) + ) == FiniteSet((x0, 0, x1, _x0, x2)) + # symbols can be given as generators + x0, x2, x4 = symbols('x0, x2, x4') + assert linsolve(Augmatrix, numbered_symbols('x') + ) == FiniteSet((x0, 0, x2, 0, x4)) + Augmatrix[-1, -1] = x0 + # use Dummy to avoid clash; the names may clash but the symbols + # will not + Augmatrix[-1, -1] = symbols('_x0') + assert len(linsolve( + Augmatrix, numbered_symbols('x', cls=Dummy)).free_symbols) == 4 + + # Issue #12604 + f = Function('f') + assert linsolve([f(x) - 5], f(x)) == FiniteSet((5,)) + + # Issue #14860 + from sympy.physics.units import meter, newton, kilo + kN = kilo*newton + Eqns = [8*kN + x + y, 28*kN*meter + 3*x*meter] + assert linsolve(Eqns, x, y) == { + (kilo*newton*Rational(-28, 3), kN*Rational(4, 3))} + + # linsolve does not allow expansion (real or implemented) + # to remove singularities, but it will cancel linear terms + assert linsolve([Eq(x, x + y)], [x, y]) == {(x, 0)} + assert linsolve([Eq(x + x*y, 1 + y)], [x]) == {(1,)} + assert linsolve([Eq(1 + y, x + x*y)], [x]) == {(1,)} + raises(NonlinearError, lambda: + linsolve([Eq(x**2, x**2 + y)], [x, y])) + + # corner cases + # + # XXX: The case below should give the same as for [0] + # assert linsolve([], [x]) == {(x,)} + assert linsolve([], [x]) is S.EmptySet + assert linsolve([0], [x]) == {(x,)} + assert linsolve([x], [x, y]) == {(0, y)} + assert linsolve([x, 0], [x, y]) == {(0, y)} + + +def test_linsolve_large_sparse(): + # + # This is mainly a performance test + # + + def _mk_eqs_sol(n): + xs = symbols('x:{}'.format(n)) + ys = symbols('y:{}'.format(n)) + syms = xs + ys + eqs = [] + sol = (-S.Half,) * n + (S.Half,) * n + for xi, yi in zip(xs, ys): + eqs.extend([xi + yi, xi - yi + 1]) + return eqs, syms, FiniteSet(sol) + + n = 500 + eqs, syms, sol = _mk_eqs_sol(n) + assert linsolve(eqs, syms) == sol + + +def test_linsolve_immutable(): + A = ImmutableDenseMatrix([[1, 1, 2], [0, 1, 2], [0, 0, 1]]) + B = ImmutableDenseMatrix([2, 1, -1]) + assert linsolve([A, B], (x, y, z)) == FiniteSet((1, 3, -1)) + + A = ImmutableDenseMatrix([[1, 1, 7], [1, -1, 3]]) + assert linsolve(A) == FiniteSet((5, 2)) + + +def test_solve_decomposition(): + n = Dummy('n') + + f1 = exp(3*x) - 6*exp(2*x) + 11*exp(x) - 6 + f2 = sin(x)**2 - 2*sin(x) + 1 + f3 = sin(x)**2 - sin(x) + f4 = sin(x + 1) + f5 = exp(x + 2) - 1 + f6 = 1/log(x) + f7 = 1/x + + s1 = ImageSet(Lambda(n, 2*n*pi), S.Integers) + s2 = ImageSet(Lambda(n, 2*n*pi + pi), S.Integers) + s3 = ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers) + s4 = ImageSet(Lambda(n, 2*n*pi - 1), S.Integers) + s5 = ImageSet(Lambda(n, 2*n*pi - 1 + pi), S.Integers) + + assert solve_decomposition(f1, x, S.Reals) == FiniteSet(0, log(2), log(3)) + assert dumeq(solve_decomposition(f2, x, S.Reals), s3) + assert dumeq(solve_decomposition(f3, x, S.Reals), Union(s1, s2, s3)) + assert dumeq(solve_decomposition(f4, x, S.Reals), Union(s4, s5)) + assert solve_decomposition(f5, x, S.Reals) == FiniteSet(-2) + assert solve_decomposition(f6, x, S.Reals) == S.EmptySet + assert solve_decomposition(f7, x, S.Reals) == S.EmptySet + assert solve_decomposition(x, x, Interval(1, 2)) == S.EmptySet + + +# nonlinsolve testcases +def test_nonlinsolve_basic(): + assert nonlinsolve([],[]) == S.EmptySet + assert nonlinsolve([],[x, y]) == S.EmptySet + + system = [x, y - x - 5] + assert nonlinsolve([x],[x, y]) == FiniteSet((0, y)) + assert nonlinsolve(system, [y]) == S.EmptySet + soln = (ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers),) + assert dumeq(nonlinsolve([sin(x) - 1], [x]), FiniteSet(tuple(soln))) + soln = ((ImageSet(Lambda(n, 2*n*pi + pi), S.Integers), 1), + (ImageSet(Lambda(n, 2*n*pi), S.Integers), 1)) + assert dumeq(nonlinsolve([sin(x), y - 1], [x, y]), FiniteSet(*soln)) + assert nonlinsolve([x**2 - 1], [x]) == FiniteSet((-1,), (1,)) + + soln = FiniteSet((y, y)) + assert nonlinsolve([x - y, 0], x, y) == soln + assert nonlinsolve([0, x - y], x, y) == soln + assert nonlinsolve([x - y, x - y], x, y) == soln + assert nonlinsolve([x, 0], x, y) == FiniteSet((0, y)) + f = Function('f') + assert nonlinsolve([f(x), 0], f(x), y) == FiniteSet((0, y)) + assert nonlinsolve([f(x), 0], f(x), f(y)) == FiniteSet((0, f(y))) + A = Indexed('A', x) + assert nonlinsolve([A, 0], A, y) == FiniteSet((0, y)) + assert nonlinsolve([x**2 -1], [sin(x)]) == FiniteSet((S.EmptySet,)) + assert nonlinsolve([x**2 -1], sin(x)) == FiniteSet((S.EmptySet,)) + assert nonlinsolve([x**2 -1], 1) == FiniteSet((x**2,)) + assert nonlinsolve([x**2 -1], x + y) == FiniteSet((S.EmptySet,)) + assert nonlinsolve([Eq(1, x + y), Eq(1, -x + y - 1), Eq(1, -x + y - 1)], x, y) == FiniteSet( + (-S.Half, 3*S.Half)) + + +def test_nonlinsolve_abs(): + soln = FiniteSet((y, y), (-y, y)) + assert nonlinsolve([Abs(x) - y], x, y) == soln + + +def test_raise_exception_nonlinsolve(): + raises(IndexError, lambda: nonlinsolve([x**2 -1], [])) + raises(ValueError, lambda: nonlinsolve([x**2 -1])) + + +def test_trig_system(): + # TODO: add more simple testcases when solveset returns + # simplified soln for Trig eq + assert nonlinsolve([sin(x) - 1, cos(x) -1 ], x) == S.EmptySet + soln1 = (ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers),) + soln = FiniteSet(soln1) + assert dumeq(nonlinsolve([sin(x) - 1, cos(x)], x), soln) + + +@XFAIL +def test_trig_system_fail(): + # fails because solveset trig solver is not much smart. + sys = [x + y - pi/2, sin(x) + sin(y) - 1] + # solveset returns conditionset for sin(x) + sin(y) - 1 + soln_1 = (ImageSet(Lambda(n, n*pi + pi/2), S.Integers), + ImageSet(Lambda(n, n*pi), S.Integers)) + soln_1 = FiniteSet(soln_1) + soln_2 = (ImageSet(Lambda(n, n*pi), S.Integers), + ImageSet(Lambda(n, n*pi+ pi/2), S.Integers)) + soln_2 = FiniteSet(soln_2) + soln = soln_1 + soln_2 + assert dumeq(nonlinsolve(sys, [x, y]), soln) + + # Add more cases from here + # http://www.vitutor.com/geometry/trigonometry/equations_systems.html#uno + sys = [sin(x) + sin(y) - (sqrt(3)+1)/2, sin(x) - sin(y) - (sqrt(3) - 1)/2] + soln_x = Union(ImageSet(Lambda(n, 2*n*pi + pi/3), S.Integers), + ImageSet(Lambda(n, 2*n*pi + pi*Rational(2, 3)), S.Integers)) + soln_y = Union(ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers), + ImageSet(Lambda(n, 2*n*pi + pi*Rational(5, 6)), S.Integers)) + assert dumeq(nonlinsolve(sys, [x, y]), FiniteSet((soln_x, soln_y))) + + +def test_nonlinsolve_positive_dimensional(): + x, y, a, b, c, d = symbols('x, y, a, b, c, d', extended_real=True) + assert nonlinsolve([x*y, x*y - x], [x, y]) == FiniteSet((0, y)) + + system = [a**2 + a*c, a - b] + assert nonlinsolve(system, [a, b]) == FiniteSet((0, 0), (-c, -c)) + # here (a= 0, b = 0) is independent soln so both is printed. + # if symbols = [a, b, c] then only {a : -c ,b : -c} + + eq1 = a + b + c + d + eq2 = a*b + b*c + c*d + d*a + eq3 = a*b*c + b*c*d + c*d*a + d*a*b + eq4 = a*b*c*d - 1 + system = [eq1, eq2, eq3, eq4] + sol1 = (-1/d, -d, 1/d, FiniteSet(d) - FiniteSet(0)) + sol2 = (1/d, -d, -1/d, FiniteSet(d) - FiniteSet(0)) + soln = FiniteSet(sol1, sol2) + assert nonlinsolve(system, [a, b, c, d]) == soln + + assert nonlinsolve([x**4 - 3*x**2 + y*x, x*z**2, y*z - 1], [x, y, z]) == \ + {(0, 1/z, z)} + + +def test_nonlinsolve_polysys(): + x, y, z = symbols('x, y, z', real=True) + assert nonlinsolve([x**2 + y - 2, x**2 + y], [x, y]) == S.EmptySet + + s = (-y + 2, y) + assert nonlinsolve([(x + y)**2 - 4, x + y - 2], [x, y]) == FiniteSet(s) + + system = [x**2 - y**2] + soln_real = FiniteSet((-y, y), (y, y)) + soln_complex = FiniteSet((-Abs(y), y), (Abs(y), y)) + soln =soln_real + soln_complex + assert nonlinsolve(system, [x, y]) == soln + + system = [x**2 - y**2] + soln_real= FiniteSet((y, -y), (y, y)) + soln_complex = FiniteSet((y, -Abs(y)), (y, Abs(y))) + soln = soln_real + soln_complex + assert nonlinsolve(system, [y, x]) == soln + + system = [x**2 + y - 3, x - y - 4] + assert nonlinsolve(system, (x, y)) != nonlinsolve(system, (y, x)) + + assert nonlinsolve([-x**2 - y**2 + z, -2*x, -2*y, S.One], [x, y, z]) == S.EmptySet + assert nonlinsolve([x + y + z, S.One, S.One, S.One], [x, y, z]) == S.EmptySet + + system = [-x**2*z**2 + x*y*z + y**4, -2*x*z**2 + y*z, x*z + 4*y**3, -2*x**2*z + x*y] + assert nonlinsolve(system, [x, y, z]) == FiniteSet((0, 0, z), (x, 0, 0)) + + +def test_nonlinsolve_using_substitution(): + x, y, z, n = symbols('x, y, z, n', real = True) + system = [(x + y)*n - y**2 + 2] + s_x = (n*y - y**2 + 2)/n + soln = (-s_x, y) + assert nonlinsolve(system, [x, y]) == FiniteSet(soln) + + system = [z**2*x**2 - z**2*y**2/exp(x)] + soln_real_1 = (y, x, 0) + soln_real_2 = (-exp(x/2)*Abs(x), x, z) + soln_real_3 = (exp(x/2)*Abs(x), x, z) + soln_complex_1 = (-x*exp(x/2), x, z) + soln_complex_2 = (x*exp(x/2), x, z) + syms = [y, x, z] + soln = FiniteSet(soln_real_1, soln_complex_1, soln_complex_2,\ + soln_real_2, soln_real_3) + assert nonlinsolve(system,syms) == soln + + +def test_nonlinsolve_complex(): + n = Dummy('n') + assert dumeq(nonlinsolve([exp(x) - sin(y), 1/y - 3], [x, y]), { + (ImageSet(Lambda(n, 2*n*I*pi + log(sin(Rational(1, 3)))), S.Integers), Rational(1, 3))}) + + system = [exp(x) - sin(y), 1/exp(y) - 3] + assert dumeq(nonlinsolve(system, [x, y]), { + (ImageSet(Lambda(n, I*(2*n*pi + pi) + + log(sin(log(3)))), S.Integers), -log(3)), + (ImageSet(Lambda(n, I*(2*n*pi + arg(sin(2*n*I*pi - log(3)))) + + log(Abs(sin(2*n*I*pi - log(3))))), S.Integers), + ImageSet(Lambda(n, 2*n*I*pi - log(3)), S.Integers))}) + + system = [exp(x) - sin(y), y**2 - 4] + assert dumeq(nonlinsolve(system, [x, y]), { + (ImageSet(Lambda(n, I*(2*n*pi + pi) + log(sin(2))), S.Integers), -2), + (ImageSet(Lambda(n, 2*n*I*pi + log(sin(2))), S.Integers), 2)}) + + system = [exp(x) - 2, y ** 2 - 2] + assert dumeq(nonlinsolve(system, [x, y]), { + (log(2), -sqrt(2)), (log(2), sqrt(2)), + (ImageSet(Lambda(n, 2*n*I*pi + log(2)), S.Integers), -sqrt(2)), + (ImageSet(Lambda(n, 2 * n * I * pi + log(2)), S.Integers), sqrt(2))}) + + +def test_nonlinsolve_radical(): + assert nonlinsolve([sqrt(y) - x - z, y - 1], [x, y, z]) == {(1 - z, 1, z)} + + +def test_nonlinsolve_inexact(): + sol = [(-1.625, -1.375), (1.625, 1.375)] + res = nonlinsolve([(x + y)**2 - 9, x**2 - y**2 - 0.75], [x, y]) + assert all(abs(res.args[i][j]-sol[i][j]) < 1e-9 + for i in range(2) for j in range(2)) + + assert nonlinsolve([(x + y)**2 - 9, (x + y)**2 - 0.75], [x, y]) == S.EmptySet + + assert nonlinsolve([y**2 + (x - 0.5)**2 - 0.0625, 2*x - 1.0, 2*y], [x, y]) == \ + S.EmptySet + + res = nonlinsolve([x**2 + y - 0.5, (x + y)**2, log(z)], [x, y, z]) + sol = [(-0.366025403784439, 0.366025403784439, 1), + (-0.366025403784439, 0.366025403784439, 1), + (1.36602540378444, -1.36602540378444, 1)] + assert all(abs(res.args[i][j]-sol[i][j]) < 1e-9 + for i in range(3) for j in range(3)) + + res = nonlinsolve([y - x**2, x**5 - x + 1.0], [x, y]) + sol = [(-1.16730397826142, 1.36259857766493), + (-0.181232444469876 - 1.08395410131771*I, + -1.14211129483496 + 0.392895302949911*I), + (-0.181232444469876 + 1.08395410131771*I, + -1.14211129483496 - 0.392895302949911*I), + (0.764884433600585 - 0.352471546031726*I, + 0.460812006002492 - 0.539199997693599*I), + (0.764884433600585 + 0.352471546031726*I, + 0.460812006002492 + 0.539199997693599*I)] + assert all(abs(res.args[i][j] - sol[i][j]) < 1e-9 + for i in range(5) for j in range(2)) + +@XFAIL +def test_solve_nonlinear_trans(): + # After the transcendental equation solver these will work + x, y = symbols('x, y', real=True) + soln1 = FiniteSet((2*LambertW(y/2), y)) + soln2 = FiniteSet((-x*sqrt(exp(x)), y), (x*sqrt(exp(x)), y)) + soln3 = FiniteSet((x*exp(x/2), x)) + soln4 = FiniteSet(2*LambertW(y/2), y) + assert nonlinsolve([x**2 - y**2/exp(x)], [x, y]) == soln1 + assert nonlinsolve([x**2 - y**2/exp(x)], [y, x]) == soln2 + assert nonlinsolve([x**2 - y**2/exp(x)], [y, x]) == soln3 + assert nonlinsolve([x**2 - y**2/exp(x)], [x, y]) == soln4 + + +def test_nonlinsolve_issue_25182(): + a1, b1, c1, ca, cb, cg = symbols('a1, b1, c1, ca, cb, cg') + eq1 = a1*a1 + b1*b1 - 2.*a1*b1*cg - c1*c1 + eq2 = a1*a1 + c1*c1 - 2.*a1*c1*cb - b1*b1 + eq3 = b1*b1 + c1*c1 - 2.*b1*c1*ca - a1*a1 + assert nonlinsolve([eq1, eq2, eq3], [c1, cb, cg]) == FiniteSet( + (1.0*b1*ca - 1.0*sqrt(a1**2 + b1**2*ca**2 - b1**2), + -1.0*sqrt(a1**2 + b1**2*ca**2 - b1**2)/a1, + -1.0*b1*(ca - 1)*(ca + 1)/a1 + 1.0*ca*sqrt(a1**2 + b1**2*ca**2 - b1**2)/a1), + (1.0*b1*ca + 1.0*sqrt(a1**2 + b1**2*ca**2 - b1**2), + 1.0*sqrt(a1**2 + b1**2*ca**2 - b1**2)/a1, + -1.0*b1*(ca - 1)*(ca + 1)/a1 - 1.0*ca*sqrt(a1**2 + b1**2*ca**2 - b1**2)/a1)) + + +def test_issue_14642(): + x = Symbol('x') + n1 = 0.5*x**3+x**2+0.5+I #add I in the Polynomials + solution = solveset(n1, x) + assert abs(solution.args[0] - (-2.28267560928153 - 0.312325580497716*I)) <= 1e-9 + assert abs(solution.args[1] - (-0.297354141679308 + 1.01904778618762*I)) <= 1e-9 + assert abs(solution.args[2] - (0.580029750960839 - 0.706722205689907*I)) <= 1e-9 + + # Symbolic + n1 = S.Half*x**3+x**2+S.Half+I + res = FiniteSet(-((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49) + /2)/2)**2)**(S(1)/6)*cos(atan((27 + 3*sqrt(3)*31985**(S(1)/4)* + cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan( + S(172)/49)/2)/2 + S(43)/2))/3)/3 - S(2)/3 - 4*cos(atan((27 + + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)* + 31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + S(43)/2))/3)/(3*((3* + sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + S(43)/2)**2 + + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2)/2)**2)**(S(1)/ + 6)) + I*(-((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/ + 2)/2)**2)**(S(1)/6)*sin(atan((27 + 3*sqrt(3)*31985**(S(1)/4)*cos( + atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49) + /2)/2 + S(43)/2))/3)/3 + 4*sin(atan((27 + 3*sqrt(3)*31985**(S(1)/4)* + cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172) + /49)/2)/2 + S(43)/2))/3)/(3*((3*sqrt(3)*31985**(S(1)/4)*sin(atan( + S(172)/49)/2)/2 + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)* + cos(atan(S(172)/49)/2)/2)**2)**(S(1)/6))), -S(2)/3 - sqrt(3)*((3* + sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + S(43)/2)**2 + + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2)/2)**2)**(S(1) + /6)*sin(atan((27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2) + /2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + S(43)/2)) + /3)/6 - 4*re(1/((-S(1)/2 - sqrt(3)*I/2)*(S(43)/2 + 27*I + sqrt(-256 + + (43 + 54*I)**2)/2)**(S(1)/3)))/3 + ((3*sqrt(3)*31985**(S(1)/4)*sin( + atan(S(172)/49)/2)/2 + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)* + cos(atan(S(172)/49)/2)/2)**2)**(S(1)/6)*cos(atan((27 + 3*sqrt(3)* + 31985**(S(1)/4)*cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)* + sin(atan(S(172)/49)/2)/2 + S(43)/2))/3)/6 + I*(-4*im(1/((-S(1)/2 - + sqrt(3)*I/2)*(S(43)/2 + 27*I + sqrt(-256 + (43 + 54*I)**2)/2)**(S(1)/ + 3)))/3 + ((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2) + /2)**2)**(S(1)/6)*sin(atan((27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan( + S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2))/3)/6 + sqrt(3)*((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/ + 49)/2)/2 + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan( + S(172)/49)/2)/2)**2)**(S(1)/6)*cos(atan((27 + 3*sqrt(3)*31985**(S(1)/ + 4)*cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan( + S(172)/49)/2)/2 + S(43)/2))/3)/6), -S(2)/3 - 4*re(1/((-S(1)/2 + + sqrt(3)*I/2)*(S(43)/2 + 27*I + sqrt(-256 + (43 + 54*I)**2)/2)**(S(1) + /3)))/3 + sqrt(3)*((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2) + /2)**2)**(S(1)/6)*sin(atan((27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan( + S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2))/3)/6 + ((3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan(S(172)/49)/2) + /2)**2)**(S(1)/6)*cos(atan((27 + 3*sqrt(3)*31985**(S(1)/4)*cos(atan( + S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin(atan(S(172)/49)/2)/2 + + S(43)/2))/3)/6 + I*(-sqrt(3)*((3*sqrt(3)*31985**(S(1)/4)*sin(atan( + S(172)/49)/2)/2 + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)*cos( + atan(S(172)/49)/2)/2)**2)**(S(1)/6)*cos(atan((27 + 3*sqrt(3)*31985**( + S(1)/4)*cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin( + atan(S(172)/49)/2)/2 + S(43)/2))/3)/6 + ((3*sqrt(3)*31985**(S(1)/4)* + sin(atan(S(172)/49)/2)/2 + S(43)/2)**2 + (27 + 3*sqrt(3)*31985**(S(1)/4)* + cos(atan(S(172)/49)/2)/2)**2)**(S(1)/6)*sin(atan((27 + 3*sqrt(3)*31985**( + S(1)/4)*cos(atan(S(172)/49)/2)/2)/(3*sqrt(3)*31985**(S(1)/4)*sin( + atan(S(172)/49)/2)/2 + S(43)/2))/3)/6 - 4*im(1/((-S(1)/2 + sqrt(3)*I/2)* + (S(43)/2 + 27*I + sqrt(-256 + (43 + 54*I)**2)/2)**(S(1)/3)))/3)) + + assert solveset(n1, x) == res + + +def test_issue_13961(): + V = (ax, bx, cx, gx, jx, lx, mx, nx, q) = symbols('ax bx cx gx jx lx mx nx q') + S = (ax*q - lx*q - mx, ax - gx*q - lx, bx*q**2 + cx*q - jx*q - nx, q*(-ax*q + lx*q + mx), q*(-ax + gx*q + lx)) + + sol = FiniteSet((lx + mx/q, (-cx*q + jx*q + nx)/q**2, cx, mx/q**2, jx, lx, mx, nx, Complement({q}, {0})), + (lx + mx/q, (cx*q - jx*q - nx)/q**2*-1, cx, mx/q**2, jx, lx, mx, nx, Complement({q}, {0}))) + assert nonlinsolve(S, *V) == sol + # The two solutions are in fact identical, so even better if only one is returned + + +def test_issue_14541(): + solutions = solveset(sqrt(-x**2 - 2.0), x) + assert abs(solutions.args[0]+1.4142135623731*I) <= 1e-9 + assert abs(solutions.args[1]-1.4142135623731*I) <= 1e-9 + + +def test_issue_13396(): + expr = -2*y*exp(-x**2 - y**2)*Abs(x) + sol = FiniteSet(0) + + assert solveset(expr, y, domain=S.Reals) == sol + + # Related type of equation also solved here + assert solveset(atan(x**2 - y**2)-pi/2, y, S.Reals) is S.EmptySet + + +def test_issue_12032(): + sol = FiniteSet(-sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))/2 + + sqrt(Abs(-2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)) + + 2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2/sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))))/2, + -sqrt(Abs(-2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)) + + 2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2/sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))))/2 - + sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))/2, + sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))/2 - + I*sqrt(Abs(-2/sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) - + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)) + + 2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))))/2, + sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)))/2 + + I*sqrt(Abs(-2/sqrt(-2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) + + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3))) - + 2*(Rational(1, 16) + sqrt(849)/144)**(Rational(1, 3)) + + 2/(3*(Rational(1, 16) + sqrt(849)/144)**(Rational(1,3)))))/2) + assert solveset(x**4 + x - 1, x) == sol + + +def test_issue_10876(): + assert solveset(1/sqrt(x), x) == S.EmptySet + + +def test_issue_19050(): + # test_issue_19050 --> TypeError removed + assert dumeq(nonlinsolve([x + y, sin(y)], [x, y]), + FiniteSet((ImageSet(Lambda(n, -2*n*pi), S.Integers), ImageSet(Lambda(n, 2*n*pi), S.Integers)),\ + (ImageSet(Lambda(n, -2*n*pi - pi), S.Integers), ImageSet(Lambda(n, 2*n*pi + pi), S.Integers)))) + assert dumeq(nonlinsolve([x + y, sin(y) + cos(y)], [x, y]), + FiniteSet((ImageSet(Lambda(n, -2*n*pi - 3*pi/4), S.Integers), ImageSet(Lambda(n, 2*n*pi + 3*pi/4), S.Integers)), \ + (ImageSet(Lambda(n, -2*n*pi - 7*pi/4), S.Integers), ImageSet(Lambda(n, 2*n*pi + 7*pi/4), S.Integers)))) + + +def test_issue_16618(): + eqn = [sin(x)*sin(y), cos(x)*cos(y) - 1] + # nonlinsolve's answer is still suspicious since it contains only three + # distinct Dummys instead of 4. (Both 'x' ImageSets share the same Dummy.) + ans = FiniteSet((ImageSet(Lambda(n, 2*n*pi), S.Integers), ImageSet(Lambda(n, 2*n*pi), S.Integers)), + (ImageSet(Lambda(n, 2*n*pi + pi), S.Integers), ImageSet(Lambda(n, 2*n*pi + pi), S.Integers))) + sol = nonlinsolve(eqn, [x, y]) + + for i0, j0 in zip(ordered(sol), ordered(ans)): + assert len(i0) == len(j0) == 2 + assert all(a.dummy_eq(b) for a, b in zip(i0, j0)) + assert len(sol) == len(ans) + + +def test_issue_17566(): + assert nonlinsolve([32*(2**x)/2**(-y) - 4**y, 27*(3**x) - S(1)/3**y], x, y) ==\ + FiniteSet((-log(81)/log(3), 1)) + + +def test_issue_16643(): + n = Dummy('n') + assert solveset(x**2*sin(x), x).dummy_eq(Union(ImageSet(Lambda(n, 2*n*pi + pi), S.Integers), + ImageSet(Lambda(n, 2*n*pi), S.Integers))) + + +def test_issue_19587(): + n,m = symbols('n m') + assert nonlinsolve([32*2**m*2**n - 4**n, 27*3**m - 3**(-n)], m, n) ==\ + FiniteSet((-log(81)/log(3), 1)) + + +def test_issue_5132_1(): + system = [sqrt(x**2 + y**2) - sqrt(10), x + y - 4] + assert nonlinsolve(system, [x, y]) == FiniteSet((1, 3), (3, 1)) + + n = Dummy('n') + eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3] + s_real_y = -log(3) + s_real_z = sqrt(-exp(2*x) - sin(log(3))) + soln_real = FiniteSet((s_real_y, s_real_z), (s_real_y, -s_real_z)) + lam = Lambda(n, 2*n*I*pi + -log(3)) + s_complex_y = ImageSet(lam, S.Integers) + lam = Lambda(n, sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3)))) + s_complex_z_1 = ImageSet(lam, S.Integers) + lam = Lambda(n, -sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3)))) + s_complex_z_2 = ImageSet(lam, S.Integers) + soln_complex = FiniteSet( + (s_complex_y, s_complex_z_1), + (s_complex_y, s_complex_z_2) + ) + soln = soln_real + soln_complex + assert dumeq(nonlinsolve(eqs, [y, z]), soln) + + +def test_issue_5132_2(): + x, y = symbols('x, y', real=True) + eqs = [exp(x)**2 - sin(y) + z**2] + n = Dummy('n') + soln_real = (log(-z**2 + sin(y))/2, z) + lam = Lambda( n, I*(2*n*pi + arg(-z**2 + sin(y)))/2 + log(Abs(z**2 - sin(y)))/2) + img = ImageSet(lam, S.Integers) + # not sure about the complex soln. But it looks correct. + soln_complex = (img, z) + soln = FiniteSet(soln_real, soln_complex) + assert dumeq(nonlinsolve(eqs, [x, z]), soln) + + system = [r - x**2 - y**2, tan(t) - y/x] + s_x = sqrt(r/(tan(t)**2 + 1)) + s_y = sqrt(r/(tan(t)**2 + 1))*tan(t) + soln = FiniteSet((s_x, s_y), (-s_x, -s_y)) + assert nonlinsolve(system, [x, y]) == soln + + +def test_issue_6752(): + a, b = symbols('a, b', real=True) + assert nonlinsolve([a**2 + a, a - b], [a, b]) == {(-1, -1), (0, 0)} + + +@SKIP("slow") +def test_issue_5114_solveset(): + # slow testcase + from sympy.abc import o, p + + # there is no 'a' in the equation set but this is how the + # problem was originally posed + syms = [a, b, c, f, h, k, n] + eqs = [b + r/d - c/d, + c*(1/d + 1/e + 1/g) - f/g - r/d, + f*(1/g + 1/i + 1/j) - c/g - h/i, + h*(1/i + 1/l + 1/m) - f/i - k/m, + k*(1/m + 1/o + 1/p) - h/m - n/p, + n*(1/p + 1/q) - k/p] + assert len(nonlinsolve(eqs, syms)) == 1 + + +@SKIP("Hangs") +def _test_issue_5335(): + # Not able to check zero dimensional system. + # is_zero_dimensional Hangs + lam, a0, conc = symbols('lam a0 conc') + eqs = [lam + 2*y - a0*(1 - x/2)*x - 0.005*x/2*x, + a0*(1 - x/2)*x - 1*y - 0.743436700916726*y, + x + y - conc] + sym = [x, y, a0] + # there are 4 solutions but only two are valid + assert len(nonlinsolve(eqs, sym)) == 2 + # float + eqs = [lam + 2*y - a0*(1 - x/2)*x - 0.005*x/2*x, + a0*(1 - x/2)*x - 1*y - 0.743436700916726*y, + x + y - conc] + sym = [x, y, a0] + assert len(nonlinsolve(eqs, sym)) == 2 + + +def test_issue_2777(): + # the equations represent two circles + x, y = symbols('x y', real=True) + e1, e2 = sqrt(x**2 + y**2) - 10, sqrt(y**2 + (-x + 10)**2) - 3 + a, b = Rational(191, 20), 3*sqrt(391)/20 + ans = {(a, -b), (a, b)} + assert nonlinsolve((e1, e2), (x, y)) == ans + assert nonlinsolve((e1, e2/(x - a)), (x, y)) == S.EmptySet + # make the 2nd circle's radius be -3 + e2 += 6 + assert nonlinsolve((e1, e2), (x, y)) == S.EmptySet + + +def test_issue_8828(): + x1 = 0 + y1 = -620 + r1 = 920 + x2 = 126 + y2 = 276 + x3 = 51 + y3 = 205 + r3 = 104 + v = [x, y, z] + + f1 = (x - x1)**2 + (y - y1)**2 - (r1 - z)**2 + f2 = (x2 - x)**2 + (y2 - y)**2 - z**2 + f3 = (x - x3)**2 + (y - y3)**2 - (r3 - z)**2 + F = [f1, f2, f3] + + g1 = sqrt((x - x1)**2 + (y - y1)**2) + z - r1 + g2 = f2 + g3 = sqrt((x - x3)**2 + (y - y3)**2) + z - r3 + G = [g1, g2, g3] + + # both soln same + A = nonlinsolve(F, v) + B = nonlinsolve(G, v) + assert A == B + + +def test_nonlinsolve_conditionset(): + # when solveset failed to solve all the eq + # return conditionset + f = Function('f') + f1 = f(x) - pi/2 + f2 = f(y) - pi*Rational(3, 2) + intermediate_system = Eq(2*f(x) - pi, 0) & Eq(2*f(y) - 3*pi, 0) + syms = Tuple(x, y) + soln = ConditionSet( + syms, + intermediate_system, + S.Complexes**2) + assert nonlinsolve([f1, f2], [x, y]) == soln + + +def test_substitution_basic(): + assert substitution([], [x, y]) == S.EmptySet + assert substitution([], []) == S.EmptySet + system = [2*x**2 + 3*y**2 - 30, 3*x**2 - 2*y**2 - 19] + soln = FiniteSet((-3, -2), (-3, 2), (3, -2), (3, 2)) + assert substitution(system, [x, y]) == soln + + soln = FiniteSet((-1, 1)) + assert substitution([x + y], [x], [{y: 1}], [y], set(), [x, y]) == soln + assert substitution( + [x + y], [x], [{y: 1}], [y], + {x + 1}, [y, x]) == S.EmptySet + + +def test_substitution_incorrect(): + # the solutions in the following two tests are incorrect. The + # correct result is EmptySet in both cases. + assert substitution([h - 1, k - 1, f - 2, f - 4, -2 * k], + [h, k, f]) == {(1, 1, f)} + assert substitution([x + y + z, S.One, S.One, S.One], [x, y, z]) == \ + {(-y - z, y, z)} + + # the correct result in the test below is {(-I, I, I, -I), + # (I, -I, -I, I)} + assert substitution([a - d, b + d, c + d, d**2 + 1], [a, b, c, d]) == \ + {(d, -d, -d, d)} + + # the result in the test below is incomplete. The complete result + # is {(0, b), (log(2), 2)} + assert substitution([a*(a - log(b)), a*(b - 2)], [a, b]) == \ + {(0, b)} + + # The system in the test below is zero-dimensional, so the result + # should have no free symbols + assert substitution([-k*y + 6*x - 4*y, -81*k + 49*y**2 - 270, + -3*k*z + k + z**3, k**2 - 2*k + 4], + [x, y, z, k]).free_symbols == {z} + + +def test_substitution_redundant(): + # the third and fourth solutions are redundant in the test below + assert substitution([x**2 - y**2, z - 1], [x, z]) == \ + {(-y, 1), (y, 1), (-sqrt(y**2), 1), (sqrt(y**2), 1)} + + # the system below has three solutions. Two of the solutions + # returned by substitution are redundant. + res = substitution([x - y, y**3 - 3*y**2 + 1], [x, y]) + assert len(res) == 5 + + +def test_issue_5132_substitution(): + x, y, z, r, t = symbols('x, y, z, r, t', real=True) + system = [r - x**2 - y**2, tan(t) - y/x] + s_x_1 = Complement(FiniteSet(-sqrt(r/(tan(t)**2 + 1))), FiniteSet(0)) + s_x_2 = Complement(FiniteSet(sqrt(r/(tan(t)**2 + 1))), FiniteSet(0)) + s_y = sqrt(r/(tan(t)**2 + 1))*tan(t) + soln = FiniteSet((s_x_2, s_y)) + FiniteSet((s_x_1, -s_y)) + assert substitution(system, [x, y]) == soln + + n = Dummy('n') + eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3] + s_real_y = -log(3) + s_real_z = sqrt(-exp(2*x) - sin(log(3))) + soln_real = FiniteSet((s_real_y, s_real_z), (s_real_y, -s_real_z)) + lam = Lambda(n, 2*n*I*pi + -log(3)) + s_complex_y = ImageSet(lam, S.Integers) + lam = Lambda(n, sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3)))) + s_complex_z_1 = ImageSet(lam, S.Integers) + lam = Lambda(n, -sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3)))) + s_complex_z_2 = ImageSet(lam, S.Integers) + soln_complex = FiniteSet( + (s_complex_y, s_complex_z_1), + (s_complex_y, s_complex_z_2)) + soln = soln_real + soln_complex + assert dumeq(substitution(eqs, [y, z]), soln) + + +def test_raises_substitution(): + raises(ValueError, lambda: substitution([x**2 -1], [])) + raises(TypeError, lambda: substitution([x**2 -1])) + raises(ValueError, lambda: substitution([x**2 -1], [sin(x)])) + raises(TypeError, lambda: substitution([x**2 -1], x)) + raises(TypeError, lambda: substitution([x**2 -1], 1)) + + +def test_issue_21022(): + from sympy.core.sympify import sympify + + eqs = [ + 'k-16', + 'p-8', + 'y*y+z*z-x*x', + 'd - x + p', + 'd*d+k*k-y*y', + 'z*z-p*p-k*k', + 'abc-efg', + ] + efg = Symbol('efg') + eqs = [sympify(x) for x in eqs] + + syb = list(ordered(set.union(*[x.free_symbols for x in eqs]))) + res = nonlinsolve(eqs, syb) + + ans = FiniteSet( + (efg, 32, efg, 16, 8, 40, -16*sqrt(5), -8*sqrt(5)), + (efg, 32, efg, 16, 8, 40, -16*sqrt(5), 8*sqrt(5)), + (efg, 32, efg, 16, 8, 40, 16*sqrt(5), -8*sqrt(5)), + (efg, 32, efg, 16, 8, 40, 16*sqrt(5), 8*sqrt(5)), + ) + assert len(res) == len(ans) == 4 + assert res == ans + for result in res.args: + assert len(result) == 8 + + +def test_issue_17940(): + n = Dummy('n') + k1 = Dummy('k1') + sol = ImageSet(Lambda(((k1, n),), I*(2*k1*pi + arg(2*n*I*pi + log(5))) + + log(Abs(2*n*I*pi + log(5)))), + ProductSet(S.Integers, S.Integers)) + assert solveset(exp(exp(x)) - 5, x).dummy_eq(sol) + + +def test_issue_17906(): + assert solveset(7**(x**2 - 80) - 49**x, x) == FiniteSet(-8, 10) + + +@XFAIL +def test_issue_17933(): + eq1 = x*sin(45) - y*cos(q) + eq2 = x*cos(45) - y*sin(q) + eq3 = 9*x*sin(45)/10 + y*cos(q) + eq4 = 9*x*cos(45)/10 + y*sin(z) - z + assert nonlinsolve([eq1, eq2, eq3, eq4], x, y, z, q) ==\ + FiniteSet((0, 0, 0, q)) + +def test_issue_17933_bis(): + # nonlinsolve's result depends on the 'default_sort_key' ordering of + # the unknowns. + eq1 = x*sin(45) - y*cos(q) + eq2 = x*cos(45) - y*sin(q) + eq3 = 9*x*sin(45)/10 + y*cos(q) + eq4 = 9*x*cos(45)/10 + y*sin(z) - z + zz = Symbol('zz') + eqs = [e.subs(q, zz) for e in (eq1, eq2, eq3, eq4)] + assert nonlinsolve(eqs, x, y, z, zz) == FiniteSet((0, 0, 0, zz)) + + +def test_issue_14565(): + # removed redundancy + assert dumeq(nonlinsolve([k + m, k + m*exp(-2*pi*k)], [k, m]) , + FiniteSet((-n*I, ImageSet(Lambda(n, n*I), S.Integers)))) + + +# end of tests for nonlinsolve + + +def test_issue_9556(): + b = Symbol('b', positive=True) + + assert solveset(Abs(x) + 1, x, S.Reals) is S.EmptySet + assert solveset(Abs(x) + b, x, S.Reals) is S.EmptySet + assert solveset(Eq(b, -1), b, S.Reals) is S.EmptySet + + +def test_issue_9611(): + assert solveset(Eq(x - x + a, a), x, S.Reals) == S.Reals + assert solveset(Eq(y - y + a, a), y) == S.Complexes + + +def test_issue_9557(): + assert solveset(x**2 + a, x, S.Reals) == Intersection(S.Reals, + FiniteSet(-sqrt(-a), sqrt(-a))) + + +def test_issue_9778(): + x = Symbol('x', real=True) + y = Symbol('y', real=True) + assert solveset(x**3 + 1, x, S.Reals) == FiniteSet(-1) + assert solveset(x**Rational(3, 5) + 1, x, S.Reals) == S.EmptySet + assert solveset(x**3 + y, x, S.Reals) == \ + FiniteSet(-Abs(y)**Rational(1, 3)*sign(y)) + + +def test_issue_10214(): + assert solveset(x**Rational(3, 2) + 4, x, S.Reals) == S.EmptySet + assert solveset(x**(Rational(-3, 2)) + 4, x, S.Reals) == S.EmptySet + + ans = FiniteSet(-2**Rational(2, 3)) + assert solveset(x**(S(3)) + 4, x, S.Reals) == ans + assert (x**(S(3)) + 4).subs(x,list(ans)[0]) == 0 # substituting ans and verifying the result. + assert (x**(S(3)) + 4).subs(x,-(-2)**Rational(2, 3)) == 0 + + +def test_issue_9849(): + assert solveset(Abs(sin(x)) + 1, x, S.Reals) == S.EmptySet + + +def test_issue_9953(): + assert linsolve([ ], x) == S.EmptySet + + +def test_issue_9913(): + assert solveset(2*x + 1/(x - 10)**2, x, S.Reals) == \ + FiniteSet(-(3*sqrt(24081)/4 + Rational(4027, 4))**Rational(1, 3)/3 - 100/ + (3*(3*sqrt(24081)/4 + Rational(4027, 4))**Rational(1, 3)) + Rational(20, 3)) + + +def test_issue_10397(): + assert solveset(sqrt(x), x, S.Complexes) == FiniteSet(0) + + +def test_issue_14987(): + raises(ValueError, lambda: linear_eq_to_matrix( + [x**2], x)) + raises(ValueError, lambda: linear_eq_to_matrix( + [x*(-3/x + 1) + 2*y - a], [x, y])) + raises(ValueError, lambda: linear_eq_to_matrix( + [(x**2 - 3*x)/(x - 3) - 3], x)) + raises(ValueError, lambda: linear_eq_to_matrix( + [(x + 1)**3 - x**3 - 3*x**2 + 7], x)) + raises(ValueError, lambda: linear_eq_to_matrix( + [x*(1/x + 1) + y], [x, y])) + raises(ValueError, lambda: linear_eq_to_matrix( + [(x + 1)*y], [x, y])) + raises(ValueError, lambda: linear_eq_to_matrix( + [Eq(1/x, 1/x + y)], [x, y])) + raises(ValueError, lambda: linear_eq_to_matrix( + [Eq(y/x, y/x + y)], [x, y])) + raises(ValueError, lambda: linear_eq_to_matrix( + [Eq(x*(x + 1), x**2 + y)], [x, y])) + + +def test_simplification(): + eq = x + (a - b)/(-2*a + 2*b) + assert solveset(eq, x) == FiniteSet(S.Half) + assert solveset(eq, x, S.Reals) == Intersection({-((a - b)/(-2*a + 2*b))}, S.Reals) + # So that ap - bn is not zero: + ap = Symbol('ap', positive=True) + bn = Symbol('bn', negative=True) + eq = x + (ap - bn)/(-2*ap + 2*bn) + assert solveset(eq, x) == FiniteSet(S.Half) + assert solveset(eq, x, S.Reals) == FiniteSet(S.Half) + + +def test_integer_domain_relational(): + eq1 = 2*x + 3 > 0 + eq2 = x**2 + 3*x - 2 >= 0 + eq3 = x + 1/x > -2 + 1/x + eq4 = x + sqrt(x**2 - 5) > 0 + eq = x + 1/x > -2 + 1/x + eq5 = eq.subs(x,log(x)) + eq6 = log(x)/x <= 0 + eq7 = log(x)/x < 0 + eq8 = x/(x-3) < 3 + eq9 = x/(x**2-3) < 3 + + assert solveset(eq1, x, S.Integers) == Range(-1, oo, 1) + assert solveset(eq2, x, S.Integers) == Union(Range(-oo, -3, 1), Range(1, oo, 1)) + assert solveset(eq3, x, S.Integers) == Union(Range(-1, 0, 1), Range(1, oo, 1)) + assert solveset(eq4, x, S.Integers) == Range(3, oo, 1) + assert solveset(eq5, x, S.Integers) == Range(2, oo, 1) + assert solveset(eq6, x, S.Integers) == Range(1, 2, 1) + assert solveset(eq7, x, S.Integers) == S.EmptySet + assert solveset(eq8, x, domain=Range(0,5)) == Range(0, 3, 1) + assert solveset(eq9, x, domain=Range(0,5)) == Union(Range(0, 2, 1), Range(2, 5, 1)) + + # test_issue_19794 + assert solveset(x + 2 < 0, x, S.Integers) == Range(-oo, -2, 1) + + +def test_issue_10555(): + f = Function('f') + g = Function('g') + assert solveset(f(x) - pi/2, x, S.Reals).dummy_eq( + ConditionSet(x, Eq(f(x) - pi/2, 0), S.Reals)) + assert solveset(f(g(x)) - pi/2, g(x), S.Reals).dummy_eq( + ConditionSet(g(x), Eq(f(g(x)) - pi/2, 0), S.Reals)) + + +def test_issue_8715(): + eq = x + 1/x > -2 + 1/x + assert solveset(eq, x, S.Reals) == \ + (Interval.open(-2, oo) - FiniteSet(0)) + assert solveset(eq.subs(x,log(x)), x, S.Reals) == \ + Interval.open(exp(-2), oo) - FiniteSet(1) + + +def test_issue_11174(): + eq = z**2 + exp(2*x) - sin(y) + soln = Intersection(S.Reals, FiniteSet(log(-z**2 + sin(y))/2)) + assert solveset(eq, x, S.Reals) == soln + + eq = sqrt(r)*Abs(tan(t))/sqrt(tan(t)**2 + 1) + x*tan(t) + s = -sqrt(r)*Abs(tan(t))/(sqrt(tan(t)**2 + 1)*tan(t)) + soln = Intersection(S.Reals, FiniteSet(s)) + assert solveset(eq, x, S.Reals) == soln + + +def test_issue_11534(): + # eq1 and eq2 should not have the same solutions because squaring both + # sides of the radical equation introduces a spurious solution branch. + # The equations have a symbolic parameter y and it is easy to see that for + # y != 0 the solution s1 will not be valid for eq1. + x = Symbol('x', real=True) + y = Symbol('y', real=True) + eq1 = -y + x/sqrt(-x**2 + 1) + eq2 = -y**2 + x**2/(-x**2 + 1) + + # We get a ConditionSet here because s1 works in eq1 if y is equal to zero + # although not for any other value of y. That case is redundant though + # because if y=0 then s1=s2 so the solution for eq1 could just be returned + # as s2 - {-1, 1}. In fact we have + # |y/sqrt(y**2 + 1)| < 1 + # So the complements are not needed either. The ideal output here would be + # sol1 = s2 + # sol2 = s1 | s2. + s1, s2 = FiniteSet(-y/sqrt(y**2 + 1)), FiniteSet(y/sqrt(y**2 + 1)) + cset = ConditionSet(x, Eq(eq1, 0), s1) + sol1 = (s2 - {-1, 1}) | (cset - {-1, 1}) + sol2 = (s1 | s2) - {-1, 1} + + assert solveset(eq1, x, S.Reals) == sol1 + assert solveset(eq2, x, S.Reals) == sol2 + + +def test_issue_10477(): + assert solveset((x**2 + 4*x - 3)/x < 2, x, S.Reals) == \ + Union(Interval.open(-oo, -3), Interval.open(0, 1)) + + +def test_issue_10671(): + assert solveset(sin(y), y, Interval(0, pi)) == FiniteSet(0, pi) + i = Interval(1, 10) + assert solveset((1/x).diff(x) < 0, x, i) == i + + +def test_issue_11064(): + eq = x + sqrt(x**2 - 5) + assert solveset(eq > 0, x, S.Reals) == \ + Interval(sqrt(5), oo) + assert solveset(eq < 0, x, S.Reals) == \ + Interval(-oo, -sqrt(5)) + assert solveset(eq > sqrt(5), x, S.Reals) == \ + Interval.Lopen(sqrt(5), oo) + + +def test_issue_12478(): + eq = sqrt(x - 2) + 2 + soln = solveset_real(eq, x) + assert soln is S.EmptySet + assert solveset(eq < 0, x, S.Reals) is S.EmptySet + assert solveset(eq > 0, x, S.Reals) == Interval(2, oo) + + +def test_issue_12429(): + eq = solveset(log(x)/x <= 0, x, S.Reals) + sol = Interval.Lopen(0, 1) + assert eq == sol + + +def test_issue_19506(): + eq = arg(x + I) + C = Dummy('C') + assert solveset(eq).dummy_eq(Intersection(ConditionSet(C, Eq(im(C) + 1, 0), S.Complexes), + ConditionSet(C, re(C) > 0, S.Complexes))) + + +def test_solveset_arg(): + assert solveset(arg(x), x, S.Reals) == Interval.open(0, oo) + assert solveset(arg(4*x -3), x, S.Reals) == Interval.open(Rational(3, 4), oo) + + +def test__is_finite_with_finite_vars(): + f = _is_finite_with_finite_vars + # issue 12482 + assert all(f(1/x) is None for x in ( + Dummy(), Dummy(real=True), Dummy(complex=True))) + assert f(1/Dummy(real=False)) is True # b/c it's finite but not 0 + + +def test_issue_13550(): + assert solveset(x**2 - 2*x - 15, symbol = x, domain = Interval(-oo, 0)) == FiniteSet(-3) + + +def test_issue_13849(): + assert nonlinsolve((t*(sqrt(5) + sqrt(2)) - sqrt(2), t), t) is S.EmptySet + + +def test_issue_14223(): + assert solveset((Abs(x + Min(x, 2)) - 2).rewrite(Piecewise), x, + S.Reals) == FiniteSet(-1, 1) + assert solveset((Abs(x + Min(x, 2)) - 2).rewrite(Piecewise), x, + Interval(0, 2)) == FiniteSet(1) + assert solveset(x, x, FiniteSet(1, 2)) is S.EmptySet + + +def test_issue_10158(): + dom = S.Reals + assert solveset(x*Max(x, 15) - 10, x, dom) == FiniteSet(Rational(2, 3)) + assert solveset(x*Min(x, 15) - 10, x, dom) == FiniteSet(-sqrt(10), sqrt(10)) + assert solveset(Max(Abs(x - 3) - 1, x + 2) - 3, x, dom) == FiniteSet(-1, 1) + assert solveset(Abs(x - 1) - Abs(y), x, dom) == FiniteSet(-Abs(y) + 1, Abs(y) + 1) + assert solveset(Abs(x + 4*Abs(x + 1)), x, dom) == FiniteSet(Rational(-4, 3), Rational(-4, 5)) + assert solveset(2*Abs(x + Abs(x + Max(3, x))) - 2, x, S.Reals) == FiniteSet(-1, -2) + dom = S.Complexes + raises(ValueError, lambda: solveset(x*Max(x, 15) - 10, x, dom)) + raises(ValueError, lambda: solveset(x*Min(x, 15) - 10, x, dom)) + raises(ValueError, lambda: solveset(Max(Abs(x - 3) - 1, x + 2) - 3, x, dom)) + raises(ValueError, lambda: solveset(Abs(x - 1) - Abs(y), x, dom)) + raises(ValueError, lambda: solveset(Abs(x + 4*Abs(x + 1)), x, dom)) + + +def test_issue_14300(): + f = 1 - exp(-18000000*x) - y + a1 = FiniteSet(-log(-y + 1)/18000000) + + assert solveset(f, x, S.Reals) == \ + Intersection(S.Reals, a1) + assert dumeq(solveset(f, x), + ImageSet(Lambda(n, -I*(2*n*pi + arg(-y + 1))/18000000 - + log(Abs(y - 1))/18000000), S.Integers)) + + +def test_issue_14454(): + number = CRootOf(x**4 + x - 1, 2) + raises(ValueError, lambda: invert_real(number, 0, x)) + assert invert_real(x**2, number, x) # no error + + +def test_issue_17882(): + assert solveset(-8*x**2/(9*(x**2 - 1)**(S(4)/3)) + 4/(3*(x**2 - 1)**(S(1)/3)), x, S.Complexes) == \ + FiniteSet(sqrt(3), -sqrt(3)) + + +def test_term_factors(): + assert list(_term_factors(3**x - 2)) == [-2, 3**x] + expr = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3) + assert set(_term_factors(expr)) == { + 3**(x + 2), 4**(x + 2), 3**(x + 3), 4**(x - 1), -1, 4**(x + 1)} + + +#################### tests for transolve and its helpers ############### + +def test_transolve(): + + assert _transolve(3**x, x, S.Reals) == S.EmptySet + assert _transolve(3**x - 9**(x + 5), x, S.Reals) == FiniteSet(-10) + + +def test_issue_21276(): + eq = (2*x*(y - z) - y*erf(y - z) - y + z*erf(y - z) + z)**2 + assert solveset(eq.expand(), y) == FiniteSet(z, z + erfinv(2*x - 1)) + + +# exponential tests +def test_exponential_real(): + from sympy.abc import y + + e1 = 3**(2*x) - 2**(x + 3) + e2 = 4**(5 - 9*x) - 8**(2 - x) + e3 = 2**x + 4**x + e4 = exp(log(5)*x) - 2**x + e5 = exp(x/y)*exp(-z/y) - 2 + e6 = 5**(x/2) - 2**(x/3) + e7 = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3) + e8 = -9*exp(-2*x + 5) + 4*exp(3*x + 1) + e9 = 2**x + 4**x + 8**x - 84 + e10 = 29*2**(x + 1)*615**(x) - 123*2726**(x) + + assert solveset(e1, x, S.Reals) == FiniteSet( + -3*log(2)/(-2*log(3) + log(2))) + assert solveset(e2, x, S.Reals) == FiniteSet(Rational(4, 15)) + assert solveset(e3, x, S.Reals) == S.EmptySet + assert solveset(e4, x, S.Reals) == FiniteSet(0) + assert solveset(e5, x, S.Reals) == Intersection( + S.Reals, FiniteSet(y*log(2*exp(z/y)))) + assert solveset(e6, x, S.Reals) == FiniteSet(0) + assert solveset(e7, x, S.Reals) == FiniteSet(2) + assert solveset(e8, x, S.Reals) == FiniteSet(-2*log(2)/5 + 2*log(3)/5 + Rational(4, 5)) + assert solveset(e9, x, S.Reals) == FiniteSet(2) + assert solveset(e10,x, S.Reals) == FiniteSet((-log(29) - log(2) + log(123))/(-log(2726) + log(2) + log(615))) + + assert solveset_real(-9*exp(-2*x + 5) + 2**(x + 1), x) == FiniteSet( + -((-5 - 2*log(3) + log(2))/(log(2) + 2))) + assert solveset_real(4**(x/2) - 2**(x/3), x) == FiniteSet(0) + b = sqrt(6)*sqrt(log(2))/sqrt(log(5)) + assert solveset_real(5**(x/2) - 2**(3/x), x) == FiniteSet(-b, b) + + # coverage test + C1, C2 = symbols('C1 C2') + f = Function('f') + assert solveset_real(C1 + C2/x**2 - exp(-f(x)), f(x)) == Intersection( + S.Reals, FiniteSet(-log(C1 + C2/x**2))) + y = symbols('y', positive=True) + assert solveset_real(x**2 - y**2/exp(x), y) == Intersection( + S.Reals, FiniteSet(-sqrt(x**2*exp(x)), sqrt(x**2*exp(x)))) + p = Symbol('p', positive=True) + assert solveset_real((1/p + 1)**(p + 1), p).dummy_eq( + ConditionSet(x, Eq((1 + 1/x)**(x + 1), 0), S.Reals)) + assert solveset(2**x - 4**x + 12, x, S.Reals) == {2} + assert solveset(2**x - 2**(2*x) + 12, x, S.Reals) == {2} + + +@XFAIL +def test_exponential_complex(): + n = Dummy('n') + + assert dumeq(solveset_complex(2**x + 4**x, x),imageset( + Lambda(n, I*(2*n*pi + pi)/log(2)), S.Integers)) + assert solveset_complex(x**z*y**z - 2, z) == FiniteSet( + log(2)/(log(x) + log(y))) + assert dumeq(solveset_complex(4**(x/2) - 2**(x/3), x), imageset( + Lambda(n, 3*n*I*pi/log(2)), S.Integers)) + assert dumeq(solveset(2**x + 32, x), imageset( + Lambda(n, (I*(2*n*pi + pi) + 5*log(2))/log(2)), S.Integers)) + + eq = (2**exp(y**2/x) + 2)/(x**2 + 15) + a = sqrt(x)*sqrt(-log(log(2)) + log(log(2) + 2*n*I*pi)) + assert solveset_complex(eq, y) == FiniteSet(-a, a) + + union1 = imageset(Lambda(n, I*(2*n*pi - pi*Rational(2, 3))/log(2)), S.Integers) + union2 = imageset(Lambda(n, I*(2*n*pi + pi*Rational(2, 3))/log(2)), S.Integers) + assert dumeq(solveset(2**x + 4**x + 8**x, x), Union(union1, union2)) + + eq = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3) + res = solveset(eq, x) + num = 2*n*I*pi - 4*log(2) + 2*log(3) + den = -2*log(2) + log(3) + ans = imageset(Lambda(n, num/den), S.Integers) + assert dumeq(res, ans) + + +def test_expo_conditionset(): + + f1 = (exp(x) + 1)**x - 2 + f2 = (x + 2)**y*x - 3 + f3 = 2**x - exp(x) - 3 + f4 = log(x) - exp(x) + f5 = 2**x + 3**x - 5**x + + assert solveset(f1, x, S.Reals).dummy_eq(ConditionSet( + x, Eq((exp(x) + 1)**x - 2, 0), S.Reals)) + assert solveset(f2, x, S.Reals).dummy_eq(ConditionSet( + x, Eq(x*(x + 2)**y - 3, 0), S.Reals)) + assert solveset(f3, x, S.Reals).dummy_eq(ConditionSet( + x, Eq(2**x - exp(x) - 3, 0), S.Reals)) + assert solveset(f4, x, S.Reals).dummy_eq(ConditionSet( + x, Eq(-exp(x) + log(x), 0), S.Reals)) + assert solveset(f5, x, S.Reals).dummy_eq(ConditionSet( + x, Eq(2**x + 3**x - 5**x, 0), S.Reals)) + + +def test_exponential_symbols(): + x, y, z = symbols('x y z', positive=True) + xr, zr = symbols('xr, zr', real=True) + + assert solveset(z**x - y, x, S.Reals) == Intersection( + S.Reals, FiniteSet(log(y)/log(z))) + + f1 = 2*x**w - 4*y**w + f2 = (x/y)**w - 2 + sol1 = Intersection({log(2)/(log(x) - log(y))}, S.Reals) + sol2 = Intersection({log(2)/log(x/y)}, S.Reals) + assert solveset(f1, w, S.Reals) == sol1, solveset(f1, w, S.Reals) + assert solveset(f2, w, S.Reals) == sol2, solveset(f2, w, S.Reals) + + assert solveset(x**x, x, Interval.Lopen(0,oo)).dummy_eq( + ConditionSet(w, Eq(w**w, 0), Interval.open(0, oo))) + assert solveset(x**y - 1, y, S.Reals) == FiniteSet(0) + assert solveset(exp(x/y)*exp(-z/y) - 2, y, S.Reals) == \ + Complement(ConditionSet(y, Eq(im(x)/y, 0) & Eq(im(z)/y, 0), \ + Complement(Intersection(FiniteSet((x - z)/log(2)), S.Reals), FiniteSet(0))), FiniteSet(0)) + assert solveset(exp(xr/y)*exp(-zr/y) - 2, y, S.Reals) == \ + Complement(FiniteSet((xr - zr)/log(2)), FiniteSet(0)) + + assert solveset(a**x - b**x, x).dummy_eq(ConditionSet( + w, Ne(a, 0) & Ne(b, 0), FiniteSet(0))) + + +def test_ignore_assumptions(): + # make sure assumptions are ignored + xpos = symbols('x', positive=True) + x = symbols('x') + assert solveset_complex(xpos**2 - 4, xpos + ) == solveset_complex(x**2 - 4, x) + + +@XFAIL +def test_issue_10864(): + assert solveset(x**(y*z) - x, x, S.Reals) == FiniteSet(1) + + +@XFAIL +def test_solve_only_exp_2(): + assert solveset_real(sqrt(exp(x)) + sqrt(exp(-x)) - 4, x) == \ + FiniteSet(2*log(-sqrt(3) + 2), 2*log(sqrt(3) + 2)) + + +def test_is_exponential(): + assert _is_exponential(y, x) is False + assert _is_exponential(3**x - 2, x) is True + assert _is_exponential(5**x - 7**(2 - x), x) is True + assert _is_exponential(sin(2**x) - 4*x, x) is False + assert _is_exponential(x**y - z, y) is True + assert _is_exponential(x**y - z, x) is False + assert _is_exponential(2**x + 4**x - 1, x) is True + assert _is_exponential(x**(y*z) - x, x) is False + assert _is_exponential(x**(2*x) - 3**x, x) is False + assert _is_exponential(x**y - y*z, y) is False + assert _is_exponential(x**y - x*z, y) is True + + +def test_solve_exponential(): + assert _solve_exponential(3**(2*x) - 2**(x + 3), 0, x, S.Reals) == \ + FiniteSet(-3*log(2)/(-2*log(3) + log(2))) + assert _solve_exponential(2**y + 4**y, 1, y, S.Reals) == \ + FiniteSet(log(Rational(-1, 2) + sqrt(5)/2)/log(2)) + assert _solve_exponential(2**y + 4**y, 0, y, S.Reals) == \ + S.EmptySet + assert _solve_exponential(2**x + 3**x - 5**x, 0, x, S.Reals) == \ + ConditionSet(x, Eq(2**x + 3**x - 5**x, 0), S.Reals) + +# end of exponential tests + + +# logarithmic tests +def test_logarithmic(): + assert solveset_real(log(x - 3) + log(x + 3), x) == FiniteSet( + -sqrt(10), sqrt(10)) + assert solveset_real(log(x + 1) - log(2*x - 1), x) == FiniteSet(2) + assert solveset_real(log(x + 3) + log(1 + 3/x) - 3, x) == FiniteSet( + -3 + sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 + exp(3)/2, + -sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 - 3 + exp(3)/2) + + eq = z - log(x) + log(y/(x*(-1 + y**2/x**2))) + assert solveset_real(eq, x) == \ + Intersection(S.Reals, FiniteSet(-sqrt(y**2 - y*exp(z)), + sqrt(y**2 - y*exp(z)))) - \ + Intersection(S.Reals, FiniteSet(-sqrt(y**2), sqrt(y**2))) + assert solveset_real( + log(3*x) - log(-x + 1) - log(4*x + 1), x) == FiniteSet(Rational(-1, 2), S.Half) + assert solveset(log(x**y) - y*log(x), x, S.Reals) == S.Reals + +@XFAIL +def test_uselogcombine_2(): + eq = log(exp(2*x) + 1) + log(-tanh(x) + 1) - log(2) + assert solveset_real(eq, x) is S.EmptySet + eq = log(8*x) - log(sqrt(x) + 1) - 2 + assert solveset_real(eq, x) is S.EmptySet + + +def test_is_logarithmic(): + assert _is_logarithmic(y, x) is False + assert _is_logarithmic(log(x), x) is True + assert _is_logarithmic(log(x) - 3, x) is True + assert _is_logarithmic(log(x)*log(y), x) is True + assert _is_logarithmic(log(x)**2, x) is False + assert _is_logarithmic(log(x - 3) + log(x + 3), x) is True + assert _is_logarithmic(log(x**y) - y*log(x), x) is True + assert _is_logarithmic(sin(log(x)), x) is False + assert _is_logarithmic(x + y, x) is False + assert _is_logarithmic(log(3*x) - log(1 - x) + 4, x) is True + assert _is_logarithmic(log(x) + log(y) + x, x) is False + assert _is_logarithmic(log(log(x - 3)) + log(x - 3), x) is True + assert _is_logarithmic(log(log(3) + x) + log(x), x) is True + assert _is_logarithmic(log(x)*(y + 3) + log(x), y) is False + + +def test_solve_logarithm(): + y = Symbol('y') + assert _solve_logarithm(log(x**y) - y*log(x), 0, x, S.Reals) == S.Reals + y = Symbol('y', positive=True) + assert _solve_logarithm(log(x)*log(y), 0, x, S.Reals) == FiniteSet(1) + +# end of logarithmic tests + + +# lambert tests +def test_is_lambert(): + a, b, c = symbols('a,b,c') + assert _is_lambert(x**2, x) is False + assert _is_lambert(a**x**2+b*x+c, x) is True + assert _is_lambert(E**2, x) is False + assert _is_lambert(x*E**2, x) is False + assert _is_lambert(3*log(x) - x*log(3), x) is True + assert _is_lambert(log(log(x - 3)) + log(x-3), x) is True + assert _is_lambert(5*x - 1 + 3*exp(2 - 7*x), x) is True + assert _is_lambert((a/x + exp(x/2)).diff(x, 2), x) is True + assert _is_lambert((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1), x) is True + assert _is_lambert(x*sinh(x) - 1, x) is True + assert _is_lambert(x*cos(x) - 5, x) is True + assert _is_lambert(tanh(x) - 5*x, x) is True + assert _is_lambert(cosh(x) - sinh(x), x) is False + +# end of lambert tests + + +def test_linear_coeffs(): + from sympy.solvers.solveset import linear_coeffs + assert linear_coeffs(0, x) == [0, 0] + assert all(i is S.Zero for i in linear_coeffs(0, x)) + assert linear_coeffs(x + 2*y + 3, x, y) == [1, 2, 3] + assert linear_coeffs(x + 2*y + 3, y, x) == [2, 1, 3] + assert linear_coeffs(x + 2*x**2 + 3, x, x**2) == [1, 2, 3] + raises(ValueError, lambda: + linear_coeffs(x + 2*x**2 + x**3, x, x**2)) + raises(ValueError, lambda: + linear_coeffs(1/x*(x - 1) + 1/x, x)) + raises(ValueError, lambda: + linear_coeffs(x, x, x)) + assert linear_coeffs(a*(x + y), x, y) == [a, a, 0] + assert linear_coeffs(1.0, x, y) == [0, 0, 1.0] + # don't include coefficients of 0 + assert linear_coeffs(Eq(x, x + y), x, y, dict=True) == {y: -1} + assert linear_coeffs(0, x, y, dict=True) == {} + + +def test_is_modular(): + assert _is_modular(y, x) is False + assert _is_modular(Mod(x, 3) - 1, x) is True + assert _is_modular(Mod(x**3 - 3*x**2 - x + 1, 3) - 1, x) is True + assert _is_modular(Mod(exp(x + y), 3) - 2, x) is True + assert _is_modular(Mod(exp(x + y), 3) - log(x), x) is True + assert _is_modular(Mod(x, 3) - 1, y) is False + assert _is_modular(Mod(x, 3)**2 - 5, x) is False + assert _is_modular(Mod(x, 3)**2 - y, x) is False + assert _is_modular(exp(Mod(x, 3)) - 1, x) is False + assert _is_modular(Mod(3, y) - 1, y) is False + + +def test_invert_modular(): + n = Dummy('n', integer=True) + from sympy.solvers.solveset import _invert_modular as invert_modular + + # no solutions + assert invert_modular(Mod(x, 12), S(1)/2, n, x) == (x, S.EmptySet) + # non invertible cases + assert invert_modular(Mod(sin(x), 7), S(5), n, x) == (Mod(sin(x), 7), 5) + assert invert_modular(Mod(exp(x), 7), S(5), n, x) == (Mod(exp(x), 7), 5) + assert invert_modular(Mod(log(x), 7), S(5), n, x) == (Mod(log(x), 7), 5) + # a is symbol + assert dumeq(invert_modular(Mod(x, 7), S(5), n, x), + (x, ImageSet(Lambda(n, 7*n + 5), S.Integers))) + # a.is_Add + assert dumeq(invert_modular(Mod(x + 8, 7), S(5), n, x), + (x, ImageSet(Lambda(n, 7*n + 4), S.Integers))) + assert invert_modular(Mod(x**2 + x, 7), S(5), n, x) == \ + (Mod(x**2 + x, 7), 5) + # a.is_Mul + assert dumeq(invert_modular(Mod(3*x, 7), S(5), n, x), + (x, ImageSet(Lambda(n, 7*n + 4), S.Integers))) + assert invert_modular(Mod((x + 1)*(x + 2), 7), S(5), n, x) == \ + (Mod((x + 1)*(x + 2), 7), 5) + # a.is_Pow + assert invert_modular(Mod(x**4, 7), S(5), n, x) == \ + (x, S.EmptySet) + assert dumeq(invert_modular(Mod(3**x, 4), S(3), n, x), + (x, ImageSet(Lambda(n, 2*n + 1), S.Naturals0))) + assert dumeq(invert_modular(Mod(2**(x**2 + x + 1), 7), S(2), n, x), + (x**2 + x + 1, ImageSet(Lambda(n, 3*n + 1), S.Naturals0))) + assert invert_modular(Mod(sin(x)**4, 7), S(5), n, x) == (x, S.EmptySet) + + +def test_solve_modular(): + n = Dummy('n', integer=True) + # if rhs has symbol (need to be implemented in future). + assert solveset(Mod(x, 4) - x, x, S.Integers + ).dummy_eq( + ConditionSet(x, Eq(-x + Mod(x, 4), 0), + S.Integers)) + # when _invert_modular fails to invert + assert solveset(3 - Mod(sin(x), 7), x, S.Integers + ).dummy_eq( + ConditionSet(x, Eq(Mod(sin(x), 7) - 3, 0), S.Integers)) + assert solveset(3 - Mod(log(x), 7), x, S.Integers + ).dummy_eq( + ConditionSet(x, Eq(Mod(log(x), 7) - 3, 0), S.Integers)) + assert solveset(3 - Mod(exp(x), 7), x, S.Integers + ).dummy_eq(ConditionSet(x, Eq(Mod(exp(x), 7) - 3, 0), + S.Integers)) + # EmptySet solution definitely + assert solveset(7 - Mod(x, 5), x, S.Integers) is S.EmptySet + assert solveset(5 - Mod(x, 5), x, S.Integers) is S.EmptySet + # Negative m + assert dumeq(solveset(2 + Mod(x, -3), x, S.Integers), + ImageSet(Lambda(n, -3*n - 2), S.Integers)) + assert solveset(4 + Mod(x, -3), x, S.Integers) is S.EmptySet + # linear expression in Mod + assert dumeq(solveset(3 - Mod(x, 5), x, S.Integers), + ImageSet(Lambda(n, 5*n + 3), S.Integers)) + assert dumeq(solveset(3 - Mod(5*x - 8, 7), x, S.Integers), + ImageSet(Lambda(n, 7*n + 5), S.Integers)) + assert dumeq(solveset(3 - Mod(5*x, 7), x, S.Integers), + ImageSet(Lambda(n, 7*n + 2), S.Integers)) + # higher degree expression in Mod + assert dumeq(solveset(Mod(x**2, 160) - 9, x, S.Integers), + Union(ImageSet(Lambda(n, 160*n + 3), S.Integers), + ImageSet(Lambda(n, 160*n + 13), S.Integers), + ImageSet(Lambda(n, 160*n + 67), S.Integers), + ImageSet(Lambda(n, 160*n + 77), S.Integers), + ImageSet(Lambda(n, 160*n + 83), S.Integers), + ImageSet(Lambda(n, 160*n + 93), S.Integers), + ImageSet(Lambda(n, 160*n + 147), S.Integers), + ImageSet(Lambda(n, 160*n + 157), S.Integers))) + assert solveset(3 - Mod(x**4, 7), x, S.Integers) is S.EmptySet + assert dumeq(solveset(Mod(x**4, 17) - 13, x, S.Integers), + Union(ImageSet(Lambda(n, 17*n + 3), S.Integers), + ImageSet(Lambda(n, 17*n + 5), S.Integers), + ImageSet(Lambda(n, 17*n + 12), S.Integers), + ImageSet(Lambda(n, 17*n + 14), S.Integers))) + # a.is_Pow tests + assert dumeq(solveset(Mod(7**x, 41) - 15, x, S.Integers), + ImageSet(Lambda(n, 40*n + 3), S.Naturals0)) + assert dumeq(solveset(Mod(12**x, 21) - 18, x, S.Integers), + ImageSet(Lambda(n, 6*n + 2), S.Naturals0)) + assert dumeq(solveset(Mod(3**x, 4) - 3, x, S.Integers), + ImageSet(Lambda(n, 2*n + 1), S.Naturals0)) + assert dumeq(solveset(Mod(2**x, 7) - 2 , x, S.Integers), + ImageSet(Lambda(n, 3*n + 1), S.Naturals0)) + assert dumeq(solveset(Mod(3**(3**x), 4) - 3, x, S.Integers), + Intersection(ImageSet(Lambda(n, Intersection({log(2*n + 1)/log(3)}, + S.Integers)), S.Naturals0), S.Integers)) + # Implemented for m without primitive root + assert solveset(Mod(x**3, 7) - 2, x, S.Integers) is S.EmptySet + assert dumeq(solveset(Mod(x**3, 8) - 1, x, S.Integers), + ImageSet(Lambda(n, 8*n + 1), S.Integers)) + assert dumeq(solveset(Mod(x**4, 9) - 4, x, S.Integers), + Union(ImageSet(Lambda(n, 9*n + 4), S.Integers), + ImageSet(Lambda(n, 9*n + 5), S.Integers))) + # domain intersection + assert dumeq(solveset(3 - Mod(5*x - 8, 7), x, S.Naturals0), + Intersection(ImageSet(Lambda(n, 7*n + 5), S.Integers), S.Naturals0)) + # Complex args + assert solveset(Mod(x, 3) - I, x, S.Integers) == \ + S.EmptySet + assert solveset(Mod(I*x, 3) - 2, x, S.Integers + ).dummy_eq( + ConditionSet(x, Eq(Mod(I*x, 3) - 2, 0), S.Integers)) + assert solveset(Mod(I + x, 3) - 2, x, S.Integers + ).dummy_eq( + ConditionSet(x, Eq(Mod(x + I, 3) - 2, 0), S.Integers)) + + # issue 17373 (https://github.com/sympy/sympy/issues/17373) + assert dumeq(solveset(Mod(x**4, 14) - 11, x, S.Integers), + Union(ImageSet(Lambda(n, 14*n + 3), S.Integers), + ImageSet(Lambda(n, 14*n + 11), S.Integers))) + assert dumeq(solveset(Mod(x**31, 74) - 43, x, S.Integers), + ImageSet(Lambda(n, 74*n + 31), S.Integers)) + + # issue 13178 + n = symbols('n', integer=True) + a = 742938285 + b = 1898888478 + m = 2**31 - 1 + c = 20170816 + assert dumeq(solveset(c - Mod(a**n*b, m), n, S.Integers), + ImageSet(Lambda(n, 2147483646*n + 100), S.Naturals0)) + assert dumeq(solveset(c - Mod(a**n*b, m), n, S.Naturals0), + Intersection(ImageSet(Lambda(n, 2147483646*n + 100), S.Naturals0), + S.Naturals0)) + assert dumeq(solveset(c - Mod(a**(2*n)*b, m), n, S.Integers), + Intersection(ImageSet(Lambda(n, 1073741823*n + 50), S.Naturals0), + S.Integers)) + assert solveset(c - Mod(a**(2*n + 7)*b, m), n, S.Integers) is S.EmptySet + assert dumeq(solveset(c - Mod(a**(n - 4)*b, m), n, S.Integers), + Intersection(ImageSet(Lambda(n, 2147483646*n + 104), S.Naturals0), + S.Integers)) + +# end of modular tests + +def test_issue_17276(): + assert nonlinsolve([Eq(x, 5**(S(1)/5)), Eq(x*y, 25*sqrt(5))], x, y) == \ + FiniteSet((5**(S(1)/5), 25*5**(S(3)/10))) + + +def test_issue_10426(): + x = Dummy('x') + a = Symbol('a') + n = Dummy('n') + assert (solveset(sin(x + a) - sin(x), a)).dummy_eq(Dummy('x')) == (Union( + ImageSet(Lambda(n, 2*n*pi), S.Integers), + Intersection(S.Complexes, ImageSet(Lambda(n, -I*(I*(2*n*pi + arg(-exp(-2*I*x))) + 2*im(x))), + S.Integers)))).dummy_eq(Dummy('x,n')) + + +def test_solveset_conjugate(): + """Test solveset for simple conjugate functions""" + assert solveset(conjugate(x) -3 + I) == FiniteSet(3 + I) + + +def test_issue_18208(): + variables = symbols('x0:16') + symbols('y0:12') + x0, x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15,\ + y0, y1, y2, y3, y4, y5, y6, y7, y8, y9, y10, y11 = variables + + eqs = [x0 + x1 + x2 + x3 - 51, + x0 + x1 + x4 + x5 - 46, + x2 + x3 + x6 + x7 - 39, + x0 + x3 + x4 + x7 - 50, + x1 + x2 + x5 + x6 - 35, + x4 + x5 + x6 + x7 - 34, + x4 + x5 + x8 + x9 - 46, + x10 + x11 + x6 + x7 - 23, + x11 + x4 + x7 + x8 - 25, + x10 + x5 + x6 + x9 - 44, + x10 + x11 + x8 + x9 - 35, + x12 + x13 + x8 + x9 - 35, + x10 + x11 + x14 + x15 - 29, + x11 + x12 + x15 + x8 - 35, + x10 + x13 + x14 + x9 - 29, + x12 + x13 + x14 + x15 - 29, + y0 + y1 + y2 + y3 - 55, + y0 + y1 + y4 + y5 - 53, + y2 + y3 + y6 + y7 - 56, + y0 + y3 + y4 + y7 - 57, + y1 + y2 + y5 + y6 - 52, + y4 + y5 + y6 + y7 - 54, + y4 + y5 + y8 + y9 - 48, + y10 + y11 + y6 + y7 - 60, + y11 + y4 + y7 + y8 - 51, + y10 + y5 + y6 + y9 - 57, + y10 + y11 + y8 + y9 - 54, + x10 - 2, + x11 - 5, + x12 - 1, + x13 - 6, + x14 - 1, + x15 - 21, + y0 - 12, + y1 - 20] + + expected = [38 - x3, x3 - 10, 23 - x3, x3, 12 - x7, x7 + 6, 16 - x7, x7, + 8, 20, 2, 5, 1, 6, 1, 21, 12, 20, -y11 + y9 + 2, y11 - y9 + 21, + -y11 - y7 + y9 + 24, y11 + y7 - y9 - 3, 33 - y7, y7, 27 - y9, y9, + 27 - y11, y11] + + A, b = linear_eq_to_matrix(eqs, variables) + + # solve + solve_expected = {v:eq for v, eq in zip(variables, expected) if v != eq} + + assert solve(eqs, variables) == solve_expected + + # linsolve + linsolve_expected = FiniteSet(Tuple(*expected)) + + assert linsolve(eqs, variables) == linsolve_expected + assert linsolve((A, b), variables) == linsolve_expected + + # gauss_jordan_solve + gj_solve, new_vars = A.gauss_jordan_solve(b) + gj_solve = list(gj_solve) + + gj_expected = linsolve_expected.subs(zip([x3, x7, y7, y9, y11], new_vars)) + + assert FiniteSet(Tuple(*gj_solve)) == gj_expected + + # nonlinsolve + # The solution set of nonlinsolve is currently equivalent to linsolve and is + # also correct. However, we would prefer to use the same symbols as parameters + # for the solution to the underdetermined system in all cases if possible. + # We want a solution that is not just equivalent but also given in the same form. + # This test may be changed should nonlinsolve be modified in this way. + + nonlinsolve_expected = FiniteSet((38 - x3, x3 - 10, 23 - x3, x3, 12 - x7, x7 + 6, + 16 - x7, x7, 8, 20, 2, 5, 1, 6, 1, 21, 12, 20, + -y5 + y7 - 1, y5 - y7 + 24, 21 - y5, y5, 33 - y7, + y7, 27 - y9, y9, -y5 + y7 - y9 + 24, y5 - y7 + y9 + 3)) + + assert nonlinsolve(eqs, variables) == nonlinsolve_expected + + +def test_substitution_with_infeasible_solution(): + a00, a01, a10, a11, l0, l1, l2, l3, m0, m1, m2, m3, m4, m5, m6, m7, c00, c01, c10, c11, p00, p01, p10, p11 = symbols( + 'a00, a01, a10, a11, l0, l1, l2, l3, m0, m1, m2, m3, m4, m5, m6, m7, c00, c01, c10, c11, p00, p01, p10, p11' + ) + solvefor = [p00, p01, p10, p11, c00, c01, c10, c11, m0, m1, m3, l0, l1, l2, l3] + system = [ + -l0 * c00 - l1 * c01 + m0 + c00 + c01, + -l0 * c10 - l1 * c11 + m1, + -l2 * c00 - l3 * c01 + c00 + c01, + -l2 * c10 - l3 * c11 + m3, + -l0 * p00 - l2 * p10 + p00 + p10, + -l1 * p00 - l3 * p10 + p00 + p10, + -l0 * p01 - l2 * p11, + -l1 * p01 - l3 * p11, + -a00 + c00 * p00 + c10 * p01, + -a01 + c01 * p00 + c11 * p01, + -a10 + c00 * p10 + c10 * p11, + -a11 + c01 * p10 + c11 * p11, + -m0 * p00, + -m1 * p01, + -m2 * p10, + -m3 * p11, + -m4 * c00, + -m5 * c01, + -m6 * c10, + -m7 * c11, + m2, + m4, + m5, + m6, + m7 + ] + sol = FiniteSet( + (0, Complement(FiniteSet(p01), FiniteSet(0)), 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, l2, l3), + (p00, Complement(FiniteSet(p01), FiniteSet(0)), 0, p11, 0, 0, 0, 0, 0, 0, 0, 1, 1, -p01/p11, -p01/p11), + (0, Complement(FiniteSet(p01), FiniteSet(0)), 0, p11, 0, 0, 0, 0, 0, 0, 0, 1, -l3*p11/p01, -p01/p11, l3), + (0, Complement(FiniteSet(p01), FiniteSet(0)), 0, p11, 0, 0, 0, 0, 0, 0, 0, -l2*p11/p01, -l3*p11/p01, l2, l3), + ) + assert sol != nonlinsolve(system, solvefor) + + +def test_issue_20097(): + assert solveset(1/sqrt(x)) is S.EmptySet + + +def test_issue_15350(): + assert solveset(diff(sqrt(1/x+x))) == FiniteSet(-1, 1) + + +def test_issue_18359(): + c1 = Piecewise((0, x < 0), (Min(1, x)/2 - Min(2, x)/2 + Min(3, x)/2, True)) + c2 = Piecewise((Piecewise((0, x < 0), (Min(1, x)/2 - Min(2, x)/2 + Min(3, x)/2, True)), x >= 0), (0, True)) + correct_result = Interval(1, 2) + result1 = solveset(c1 - Rational(1, 2), x, Interval(0, 3)) + result2 = solveset(c2 - Rational(1, 2), x, Interval(0, 3)) + assert result1 == correct_result + assert result2 == correct_result + + +def test_issue_17604(): + lhs = -2**(3*x/11)*exp(x/11) + pi**(x/11) + assert _is_exponential(lhs, x) + assert _solve_exponential(lhs, 0, x, S.Complexes) == FiniteSet(0) + + +def test_issue_17580(): + assert solveset(1/(1 - x**3)**2, x, S.Reals) is S.EmptySet + + +def test_issue_17566_actual(): + sys = [2**x + 2**y - 3, 4**x + 9**y - 5] + # Not clear this is the correct result, but at least no recursion error + assert nonlinsolve(sys, x, y) == FiniteSet((log(3 - 2**y)/log(2), y)) + + +def test_issue_17565(): + eq = Ge(2*(x - 2)**2/(3*(x + 1)**(Integer(1)/3)) + 2*(x - 2)*(x + 1)**(Integer(2)/3), 0) + res = Union(Interval.Lopen(-1, -Rational(1, 4)), Interval(2, oo)) + assert solveset(eq, x, S.Reals) == res + + +def test_issue_15024(): + function = (x + 5)/sqrt(-x**2 - 10*x) + assert solveset(function, x, S.Reals) == FiniteSet(Integer(-5)) + + +def test_issue_16877(): + assert dumeq(nonlinsolve([x - 1, sin(y)], x, y), + FiniteSet((1, ImageSet(Lambda(n, 2*n*pi), S.Integers)), + (1, ImageSet(Lambda(n, 2*n*pi + pi), S.Integers)))) + # Even better if (1, ImageSet(Lambda(n, n*pi), S.Integers)) is obtained + + +def test_issue_16876(): + assert dumeq(nonlinsolve([sin(x), 2*x - 4*y], x, y), + FiniteSet((ImageSet(Lambda(n, 2*n*pi), S.Integers), + ImageSet(Lambda(n, n*pi), S.Integers)), + (ImageSet(Lambda(n, 2*n*pi + pi), S.Integers), + ImageSet(Lambda(n, n*pi + pi/2), S.Integers)))) + # Even better if (ImageSet(Lambda(n, n*pi), S.Integers), + # ImageSet(Lambda(n, n*pi/2), S.Integers)) is obtained + +def test_issue_21236(): + x, z = symbols("x z") + y = symbols('y', rational=True) + assert solveset(x**y - z, x, S.Reals) == ConditionSet(x, Eq(x**y - z, 0), S.Reals) + e1, e2 = symbols('e1 e2', even=True) + y = e1/e2 # don't know if num or den will be odd and the other even + assert solveset(x**y - z, x, S.Reals) == ConditionSet(x, Eq(x**y - z, 0), S.Reals) + + +def test_issue_21908(): + assert nonlinsolve([(x**2 + 2*x - y**2)*exp(x), -2*y*exp(x)], x, y + ) == {(-2, 0), (0, 0)} + + +def test_issue_19144(): + # test case 1 + expr1 = [x + y - 1, y**2 + 1] + eq1 = [Eq(i, 0) for i in expr1] + soln1 = {(1 - I, I), (1 + I, -I)} + soln_expr1 = nonlinsolve(expr1, [x, y]) + soln_eq1 = nonlinsolve(eq1, [x, y]) + assert soln_eq1 == soln_expr1 == soln1 + # test case 2 - with denoms + expr2 = [x/y - 1, y**2 + 1] + eq2 = [Eq(i, 0) for i in expr2] + soln2 = {(-I, -I), (I, I)} + soln_expr2 = nonlinsolve(expr2, [x, y]) + soln_eq2 = nonlinsolve(eq2, [x, y]) + assert soln_eq2 == soln_expr2 == soln2 + # denominators that cancel in expression + assert nonlinsolve([Eq(x + 1/x, 1/x)], [x]) == FiniteSet((S.EmptySet,)) + + +def test_issue_22413(): + res = nonlinsolve((4*y*(2*x + 2*exp(y) + 1)*exp(2*x), + 4*x*exp(2*x) + 4*y*exp(2*x + y) + 4*exp(2*x + y) + 1), + x, y) + # First solution is not correct, but the issue was an exception + sols = FiniteSet((x, S.Zero), (-exp(y) - S.Half, y)) + assert res == sols + + +def test_issue_23318(): + eqs_eq = [ + Eq(53.5780461486929, x * log(y / (5.0 - y) + 1) / y), + Eq(x, 0.0015 * z), + Eq(0.0015, 7845.32 * y / z), + ] + eqs_expr = [eq.lhs - eq.rhs for eq in eqs_eq] + + sol = {(266.97755814852, 0.0340301680681629, 177985.03876568)} + + assert_close_nl(nonlinsolve(eqs_eq, [x, y, z]), sol) + assert_close_nl(nonlinsolve(eqs_expr, [x, y, z]), sol) + + logterm = log(1.91196789933362e-7*z/(5.0 - 1.91196789933362e-7*z) + 1) + eq = -0.0015*z*logterm + 1.02439504345316e-5*z + assert_close_ss(solveset(eq, z), {0, 177985.038765679}) + + +def test_issue_19814(): + assert nonlinsolve([ 2**m - 2**(2*n), 4*2**m - 2**(4*n)], m, n + ) == FiniteSet((log(2**(2*n))/log(2), S.Complexes)) + + +def test_issue_22058(): + sol = solveset(-sqrt(t)*x**2 + 2*x + sqrt(t), x, S.Reals) + # doesn't fail (and following numerical check) + assert sol.xreplace({t: 1}) == {1 - sqrt(2), 1 + sqrt(2)}, sol.xreplace({t: 1}) + + +def test_issue_11184(): + assert solveset(20*sqrt(y**2 + (sqrt(-(y - 10)*(y + 10)) + 10)**2) - 60, y, S.Reals) is S.EmptySet + + +def test_issue_21890(): + e = S(2)/3 + assert nonlinsolve([4*x**3*y**4 - 2*y, 4*x**4*y**3 - 2*x], x, y) == { + (2**e/(2*y), y), ((-2**e/4 - 2**e*sqrt(3)*I/4)/y, y), + ((-2**e/4 + 2**e*sqrt(3)*I/4)/y, y)} + assert nonlinsolve([(1 - 4*x**2)*exp(-2*x**2 - 2*y**2), + -4*x*y*exp(-2*x**2)*exp(-2*y**2)], x, y) == {(-S(1)/2, 0), (S(1)/2, 0)} + rx, ry = symbols('x y', real=True) + sol = nonlinsolve([4*rx**3*ry**4 - 2*ry, 4*rx**4*ry**3 - 2*rx], rx, ry) + ans = {(2**(S(2)/3)/(2*ry), ry), + ((-2**(S(2)/3)/4 - 2**(S(2)/3)*sqrt(3)*I/4)/ry, ry), + ((-2**(S(2)/3)/4 + 2**(S(2)/3)*sqrt(3)*I/4)/ry, ry)} + assert sol == ans + + +def test_issue_22628(): + assert nonlinsolve([h - 1, k - 1, f - 2, f - 4, -2*k], h, k, f) == S.EmptySet + assert nonlinsolve([x**3 - 1, x + y, x**2 - 4], [x, y]) == S.EmptySet + + +def test_issue_25781(): + assert solve(sqrt(x/2) - x) == [0, S.Half] + + +def test_issue_26077(): + _n = Symbol('_n') + function = x*cot(5*x) + critical_points = stationary_points(function, x, S.Reals) + excluded_points = Union( + ImageSet(Lambda(_n, 2*_n*pi/5), S.Integers), + ImageSet(Lambda(_n, 2*_n*pi/5 + pi/5), S.Integers) + ) + solution = ConditionSet(x, + Eq(x*(-5*cot(5*x)**2 - 5) + cot(5*x), 0), + Complement(S.Reals, excluded_points) + ) + assert solution.as_dummy() == critical_points.as_dummy() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..aa66402955e7d5d2b27cccc6627b42d33f4cd855 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/__init__.py @@ -0,0 +1,10 @@ +"""This module contains code for running the tests in SymPy.""" + + +from .runtests import doctest +from .runtests_pytest import test + + +__all__ = [ + 'test', 'doctest', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/matrices.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..236a384366df7f69d0d92f43f7e007e95c12388c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/matrices.py @@ -0,0 +1,8 @@ +def allclose(A, B, rtol=1e-05, atol=1e-08): + if len(A) != len(B): + return False + + for x, y in zip(A, B): + if abs(x-y) > atol + rtol * max(abs(x), abs(y)): + return False + return True diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/pytest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/pytest.py new file mode 100644 index 0000000000000000000000000000000000000000..498515a2d3c0a167a5f7067753736898cfa64799 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/pytest.py @@ -0,0 +1,392 @@ +"""py.test hacks to support XFAIL/XPASS""" + +import platform +import sys +import re +import functools +import os +import contextlib +import warnings +import inspect +import pathlib +from typing import Any, Callable + +from sympy.utilities.exceptions import SymPyDeprecationWarning +# Imported here for backwards compatibility. Note: do not import this from +# here in library code (importing sympy.pytest in library code will break the +# pytest integration). +from sympy.utilities.exceptions import ignore_warnings # noqa:F401 + +ON_CI = os.getenv('CI', None) == "true" + +try: + import pytest + USE_PYTEST = getattr(sys, '_running_pytest', False) +except ImportError: + USE_PYTEST = False + +IS_WASM: bool = sys.platform == 'emscripten' or platform.machine() in ["wasm32", "wasm64"] + +raises: Callable[[Any, Any], Any] +XFAIL: Callable[[Any], Any] +skip: Callable[[Any], Any] +SKIP: Callable[[Any], Any] +slow: Callable[[Any], Any] +tooslow: Callable[[Any], Any] +nocache_fail: Callable[[Any], Any] + + +if USE_PYTEST: + raises = pytest.raises + skip = pytest.skip + XFAIL = pytest.mark.xfail + SKIP = pytest.mark.skip + slow = pytest.mark.slow + tooslow = pytest.mark.tooslow + nocache_fail = pytest.mark.nocache_fail + from _pytest.outcomes import Failed + +else: + # Not using pytest so define the things that would have been imported from + # there. + + # _pytest._code.code.ExceptionInfo + class ExceptionInfo: + def __init__(self, value): + self.value = value + + def __repr__(self): + return "".format(self.value) + + + def raises(expectedException, code=None): + """ + Tests that ``code`` raises the exception ``expectedException``. + + ``code`` may be a callable, such as a lambda expression or function + name. + + If ``code`` is not given or None, ``raises`` will return a context + manager for use in ``with`` statements; the code to execute then + comes from the scope of the ``with``. + + ``raises()`` does nothing if the callable raises the expected exception, + otherwise it raises an AssertionError. + + Examples + ======== + + >>> from sympy.testing.pytest import raises + + >>> raises(ZeroDivisionError, lambda: 1/0) + + >>> raises(ZeroDivisionError, lambda: 1/2) + Traceback (most recent call last): + ... + Failed: DID NOT RAISE + + >>> with raises(ZeroDivisionError): + ... n = 1/0 + >>> with raises(ZeroDivisionError): + ... n = 1/2 + Traceback (most recent call last): + ... + Failed: DID NOT RAISE + + Note that you cannot test multiple statements via + ``with raises``: + + >>> with raises(ZeroDivisionError): + ... n = 1/0 # will execute and raise, aborting the ``with`` + ... n = 9999/0 # never executed + + This is just what ``with`` is supposed to do: abort the + contained statement sequence at the first exception and let + the context manager deal with the exception. + + To test multiple statements, you'll need a separate ``with`` + for each: + + >>> with raises(ZeroDivisionError): + ... n = 1/0 # will execute and raise + >>> with raises(ZeroDivisionError): + ... n = 9999/0 # will also execute and raise + + """ + if code is None: + return RaisesContext(expectedException) + elif callable(code): + try: + code() + except expectedException as e: + return ExceptionInfo(e) + raise Failed("DID NOT RAISE") + elif isinstance(code, str): + raise TypeError( + '\'raises(xxx, "code")\' has been phased out; ' + 'change \'raises(xxx, "expression")\' ' + 'to \'raises(xxx, lambda: expression)\', ' + '\'raises(xxx, "statement")\' ' + 'to \'with raises(xxx): statement\'') + else: + raise TypeError( + 'raises() expects a callable for the 2nd argument.') + + class RaisesContext: + def __init__(self, expectedException): + self.expectedException = expectedException + + def __enter__(self): + return None + + def __exit__(self, exc_type, exc_value, traceback): + if exc_type is None: + raise Failed("DID NOT RAISE") + return issubclass(exc_type, self.expectedException) + + class XFail(Exception): + pass + + class XPass(Exception): + pass + + class Skipped(Exception): + pass + + class Failed(Exception): # type: ignore + pass + + def XFAIL(func): + def wrapper(): + try: + func() + except Exception as e: + message = str(e) + if message != "Timeout": + raise XFail(func.__name__) + else: + raise Skipped("Timeout") + raise XPass(func.__name__) + + wrapper = functools.update_wrapper(wrapper, func) + return wrapper + + def skip(str): + raise Skipped(str) + + def SKIP(reason): + """Similar to ``skip()``, but this is a decorator. """ + def wrapper(func): + def func_wrapper(): + raise Skipped(reason) + + func_wrapper = functools.update_wrapper(func_wrapper, func) + return func_wrapper + + return wrapper + + def slow(func): + func._slow = True + + def func_wrapper(): + func() + + func_wrapper = functools.update_wrapper(func_wrapper, func) + func_wrapper.__wrapped__ = func + return func_wrapper + + def tooslow(func): + func._slow = True + func._tooslow = True + + def func_wrapper(): + skip("Too slow") + + func_wrapper = functools.update_wrapper(func_wrapper, func) + func_wrapper.__wrapped__ = func + return func_wrapper + + def nocache_fail(func): + "Dummy decorator for marking tests that fail when cache is disabled" + return func + +@contextlib.contextmanager +def warns(warningcls, *, match='', test_stacklevel=True): + ''' + Like raises but tests that warnings are emitted. + + >>> from sympy.testing.pytest import warns + >>> import warnings + + >>> with warns(UserWarning): + ... warnings.warn('deprecated', UserWarning, stacklevel=2) + + >>> with warns(UserWarning): + ... pass + Traceback (most recent call last): + ... + Failed: DID NOT WARN. No warnings of type UserWarning\ + was emitted. The list of emitted warnings is: []. + + ``test_stacklevel`` makes it check that the ``stacklevel`` parameter to + ``warn()`` is set so that the warning shows the user line of code (the + code under the warns() context manager). Set this to False if this is + ambiguous or if the context manager does not test the direct user code + that emits the warning. + + If the warning is a ``SymPyDeprecationWarning``, this additionally tests + that the ``active_deprecations_target`` is a real target in the + ``active-deprecations.md`` file. + + ''' + # Absorbs all warnings in warnrec + with warnings.catch_warnings(record=True) as warnrec: + # Any warning other than the one we are looking for is an error + warnings.simplefilter("error") + warnings.filterwarnings("always", category=warningcls) + # Now run the test + yield warnrec + + # Raise if expected warning not found + if not any(issubclass(w.category, warningcls) for w in warnrec): + msg = ('Failed: DID NOT WARN.' + ' No warnings of type %s was emitted.' + ' The list of emitted warnings is: %s.' + ) % (warningcls, [w.message for w in warnrec]) + raise Failed(msg) + + # We don't include the match in the filter above because it would then + # fall to the error filter, so we instead manually check that it matches + # here + for w in warnrec: + # Should always be true due to the filters above + assert issubclass(w.category, warningcls) + if not re.compile(match, re.IGNORECASE).match(str(w.message)): + raise Failed(f"Failed: WRONG MESSAGE. A warning with of the correct category ({warningcls.__name__}) was issued, but it did not match the given match regex ({match!r})") + + if test_stacklevel: + for f in inspect.stack(): + thisfile = f.filename + file = os.path.split(thisfile)[1] + if file.startswith('test_'): + break + elif file == 'doctest.py': + # skip the stacklevel testing in the doctests of this + # function + return + else: + raise RuntimeError("Could not find the file for the given warning to test the stacklevel") + for w in warnrec: + if w.filename != thisfile: + msg = f'''\ +Failed: Warning has the wrong stacklevel. The warning stacklevel needs to be +set so that the line of code shown in the warning message is user code that +calls the deprecated code (the current stacklevel is showing code from +{w.filename} (line {w.lineno}), expected {thisfile})'''.replace('\n', ' ') + raise Failed(msg) + + if warningcls == SymPyDeprecationWarning: + this_file = pathlib.Path(__file__) + active_deprecations_file = (this_file.parent.parent.parent / 'doc' / + 'src' / 'explanation' / + 'active-deprecations.md') + if not active_deprecations_file.exists(): + # We can only test that the active_deprecations_target works if we are + # in the git repo. + return + targets = [] + for w in warnrec: + targets.append(w.message.active_deprecations_target) + text = pathlib.Path(active_deprecations_file).read_text(encoding="utf-8") + for target in targets: + if f'({target})=' not in text: + raise Failed(f"The active deprecations target {target!r} does not appear to be a valid target in the active-deprecations.md file ({active_deprecations_file}).") + +def _both_exp_pow(func): + """ + Decorator used to run the test twice: the first time `e^x` is represented + as ``Pow(E, x)``, the second time as ``exp(x)`` (exponential object is not + a power). + + This is a temporary trick helping to manage the elimination of the class + ``exp`` in favor of a replacement by ``Pow(E, ...)``. + """ + from sympy.core.parameters import _exp_is_pow + + def func_wrap(): + with _exp_is_pow(True): + func() + with _exp_is_pow(False): + func() + + wrapper = functools.update_wrapper(func_wrap, func) + return wrapper + + +@contextlib.contextmanager +def warns_deprecated_sympy(): + ''' + Shorthand for ``warns(SymPyDeprecationWarning)`` + + This is the recommended way to test that ``SymPyDeprecationWarning`` is + emitted for deprecated features in SymPy. To test for other warnings use + ``warns``. To suppress warnings without asserting that they are emitted + use ``ignore_warnings``. + + .. note:: + + ``warns_deprecated_sympy()`` is only intended for internal use in the + SymPy test suite to test that a deprecation warning triggers properly. + All other code in the SymPy codebase, including documentation examples, + should not use deprecated behavior. + + If you are a user of SymPy and you want to disable + SymPyDeprecationWarnings, use ``warnings`` filters (see + :ref:`silencing-sympy-deprecation-warnings`). + + >>> from sympy.testing.pytest import warns_deprecated_sympy + >>> from sympy.utilities.exceptions import sympy_deprecation_warning + >>> with warns_deprecated_sympy(): + ... sympy_deprecation_warning("Don't use", + ... deprecated_since_version="1.0", + ... active_deprecations_target="active-deprecations") + + >>> with warns_deprecated_sympy(): + ... pass + Traceback (most recent call last): + ... + Failed: DID NOT WARN. No warnings of type \ + SymPyDeprecationWarning was emitted. The list of emitted warnings is: []. + + .. note:: + + Sometimes the stacklevel test will fail because the same warning is + emitted multiple times. In this case, you can use + :func:`sympy.utilities.exceptions.ignore_warnings` in the code to + prevent the ``SymPyDeprecationWarning`` from being emitted again + recursively. In rare cases it is impossible to have a consistent + ``stacklevel`` for deprecation warnings because different ways of + calling a function will produce different call stacks.. In those cases, + use ``warns(SymPyDeprecationWarning)`` instead. + + See Also + ======== + sympy.utilities.exceptions.SymPyDeprecationWarning + sympy.utilities.exceptions.sympy_deprecation_warning + sympy.utilities.decorator.deprecated + + ''' + with warns(SymPyDeprecationWarning): + yield + + +def skip_under_pyodide(message): + """Decorator to skip a test if running under Pyodide/WASM.""" + def decorator(test_func): + @functools.wraps(test_func) + def test_wrapper(): + if IS_WASM: + skip(message) + return test_func() + return test_wrapper + return decorator diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/quality_unicode.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/quality_unicode.py new file mode 100644 index 0000000000000000000000000000000000000000..d43623ff5112610e377347f50c6a40a15810644b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/quality_unicode.py @@ -0,0 +1,102 @@ +import re +import fnmatch + + +message_unicode_B = \ + "File contains a unicode character : %s, line %s. " \ + "But not in the whitelist. " \ + "Add the file to the whitelist in " + __file__ +message_unicode_D = \ + "File does not contain a unicode character : %s." \ + "but is in the whitelist. " \ + "Remove the file from the whitelist in " + __file__ + + +encoding_header_re = re.compile( + r'^[ \t\f]*#.*?coding[:=][ \t]*([-_.a-zA-Z0-9]+)') + +# Whitelist pattern for files which can have unicode. +unicode_whitelist = [ + # Author names can include non-ASCII characters + r'*/bin/authors_update.py', + r'*/bin/mailmap_check.py', + + # These files have functions and test functions for unicode input and + # output. + r'*/sympy/testing/tests/test_code_quality.py', + r'*/sympy/physics/vector/tests/test_printing.py', + r'*/physics/quantum/tests/test_printing.py', + r'*/sympy/vector/tests/test_printing.py', + r'*/sympy/parsing/tests/test_sympy_parser.py', + r'*/sympy/printing/pretty/stringpict.py', + r'*/sympy/printing/pretty/tests/test_pretty.py', + r'*/sympy/printing/tests/test_conventions.py', + r'*/sympy/printing/tests/test_preview.py', + r'*/liealgebras/type_g.py', + r'*/liealgebras/weyl_group.py', + r'*/liealgebras/tests/test_type_G.py', + + # wigner.py and polarization.py have unicode doctests. These probably + # don't need to be there but some of the examples that are there are + # pretty ugly without use_unicode (matrices need to be wrapped across + # multiple lines etc) + r'*/sympy/physics/wigner.py', + r'*/sympy/physics/optics/polarization.py', + + # joint.py uses some unicode for variable names in the docstrings + r'*/sympy/physics/mechanics/joint.py', + + # lll method has unicode in docstring references and author name + r'*/sympy/polys/matrices/domainmatrix.py', + r'*/sympy/matrices/repmatrix.py', + + # Explanation of symbols uses greek letters + r'*/sympy/core/symbol.py', +] + +unicode_strict_whitelist = [ + r'*/sympy/parsing/latex/_antlr/__init__.py', + # test_mathematica.py uses some unicode for testing Greek characters are working #24055 + r'*/sympy/parsing/tests/test_mathematica.py', +] + + +def _test_this_file_encoding( + fname, test_file, + unicode_whitelist=unicode_whitelist, + unicode_strict_whitelist=unicode_strict_whitelist): + """Test helper function for unicode test + + The test may have to operate on filewise manner, so it had moved + to a separate process. + """ + has_unicode = False + + is_in_whitelist = False + is_in_strict_whitelist = False + for patt in unicode_whitelist: + if fnmatch.fnmatch(fname, patt): + is_in_whitelist = True + break + for patt in unicode_strict_whitelist: + if fnmatch.fnmatch(fname, patt): + is_in_strict_whitelist = True + is_in_whitelist = True + break + + if is_in_whitelist: + for idx, line in enumerate(test_file): + try: + line.encode(encoding='ascii') + except (UnicodeEncodeError, UnicodeDecodeError): + has_unicode = True + + if not has_unicode and not is_in_strict_whitelist: + assert False, message_unicode_D % fname + + else: + for idx, line in enumerate(test_file): + try: + line.encode(encoding='ascii') + except (UnicodeEncodeError, UnicodeDecodeError): + assert False, message_unicode_B % (fname, idx + 1) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/randtest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/randtest.py new file mode 100644 index 0000000000000000000000000000000000000000..3ce2c8c031eec1c886532daba32c96d83e9cf85c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/randtest.py @@ -0,0 +1,19 @@ +""" +.. deprecated:: 1.10 + + ``sympy.testing.randtest`` functions have been moved to + :mod:`sympy.core.random`. + +""" +from sympy.utilities.exceptions import sympy_deprecation_warning + +sympy_deprecation_warning("The sympy.testing.randtest submodule is deprecated. Use sympy.core.random instead.", + deprecated_since_version="1.10", + active_deprecations_target="deprecated-sympy-testing-randtest") + +from sympy.core.random import ( # noqa:F401 + random_complex_number, + verify_numerically, + test_derivative_numerically, + _randrange, + _randint) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests.py new file mode 100644 index 0000000000000000000000000000000000000000..e2650e4e6dabaaa07fc25c76cce3d9d28723b0d5 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests.py @@ -0,0 +1,2409 @@ +""" +This is our testing framework. + +Goals: + +* it should be compatible with py.test and operate very similarly + (or identically) +* does not require any external dependencies +* preferably all the functionality should be in this file only +* no magic, just import the test file and execute the test functions, that's it +* portable + +""" + +import os +import sys +import platform +import inspect +import traceback +import pdb +import re +import linecache +import time +from fnmatch import fnmatch +from timeit import default_timer as clock +import doctest as pdoctest # avoid clashing with our doctest() function +from doctest import DocTestFinder, DocTestRunner +import random +import subprocess +import shutil +import signal +import stat +import tempfile +import warnings +from contextlib import contextmanager +from inspect import unwrap +from pathlib import Path + +from sympy.core.cache import clear_cache +from sympy.external import import_module +from sympy.external.gmpy import GROUND_TYPES + +IS_WINDOWS = (os.name == 'nt') +ON_CI = os.getenv('CI', None) + +# empirically generated list of the proportion of time spent running +# an even split of tests. This should periodically be regenerated. +# A list of [.6, .1, .3] would mean that if the tests are evenly split +# into '1/3', '2/3', '3/3', the first split would take 60% of the time, +# the second 10% and the third 30%. These lists are normalized to sum +# to 1, so [60, 10, 30] has the same behavior as [6, 1, 3] or [.6, .1, .3]. +# +# This list can be generated with the code: +# from time import time +# import sympy +# import os +# os.environ["CI"] = 'true' # Mock CI to get more correct densities +# delays, num_splits = [], 30 +# for i in range(1, num_splits + 1): +# tic = time() +# sympy.test(split='{}/{}'.format(i, num_splits), time_balance=False) # Add slow=True for slow tests +# delays.append(time() - tic) +# tot = sum(delays) +# print([round(x / tot, 4) for x in delays]) +SPLIT_DENSITY = [ + 0.0059, 0.0027, 0.0068, 0.0011, 0.0006, + 0.0058, 0.0047, 0.0046, 0.004, 0.0257, + 0.0017, 0.0026, 0.004, 0.0032, 0.0016, + 0.0015, 0.0004, 0.0011, 0.0016, 0.0014, + 0.0077, 0.0137, 0.0217, 0.0074, 0.0043, + 0.0067, 0.0236, 0.0004, 0.1189, 0.0142, + 0.0234, 0.0003, 0.0003, 0.0047, 0.0006, + 0.0013, 0.0004, 0.0008, 0.0007, 0.0006, + 0.0139, 0.0013, 0.0007, 0.0051, 0.002, + 0.0004, 0.0005, 0.0213, 0.0048, 0.0016, + 0.0012, 0.0014, 0.0024, 0.0015, 0.0004, + 0.0005, 0.0007, 0.011, 0.0062, 0.0015, + 0.0021, 0.0049, 0.0006, 0.0006, 0.0011, + 0.0006, 0.0019, 0.003, 0.0044, 0.0054, + 0.0057, 0.0049, 0.0016, 0.0006, 0.0009, + 0.0006, 0.0012, 0.0006, 0.0149, 0.0532, + 0.0076, 0.0041, 0.0024, 0.0135, 0.0081, + 0.2209, 0.0459, 0.0438, 0.0488, 0.0137, + 0.002, 0.0003, 0.0008, 0.0039, 0.0024, + 0.0005, 0.0004, 0.003, 0.056, 0.0026] +SPLIT_DENSITY_SLOW = [0.0086, 0.0004, 0.0568, 0.0003, 0.0032, 0.0005, 0.0004, 0.0013, 0.0016, 0.0648, 0.0198, 0.1285, 0.098, 0.0005, 0.0064, 0.0003, 0.0004, 0.0026, 0.0007, 0.0051, 0.0089, 0.0024, 0.0033, 0.0057, 0.0005, 0.0003, 0.001, 0.0045, 0.0091, 0.0006, 0.0005, 0.0321, 0.0059, 0.1105, 0.216, 0.1489, 0.0004, 0.0003, 0.0006, 0.0483] + +class Skipped(Exception): + pass + +class TimeOutError(Exception): + pass + +class DependencyError(Exception): + pass + + +def _indent(s, indent=4): + """ + Add the given number of space characters to the beginning of + every non-blank line in ``s``, and return the result. + If the string ``s`` is Unicode, it is encoded using the stdout + encoding and the ``backslashreplace`` error handler. + """ + # This regexp matches the start of non-blank lines: + return re.sub('(?m)^(?!$)', indent*' ', s) + + +pdoctest._indent = _indent # type: ignore + +# override reporter to maintain windows and python3 + + +def _report_failure(self, out, test, example, got): + """ + Report that the given example failed. + """ + s = self._checker.output_difference(example, got, self.optionflags) + s = s.encode('raw_unicode_escape').decode('utf8', 'ignore') + out(self._failure_header(test, example) + s) + + +if IS_WINDOWS: + DocTestRunner.report_failure = _report_failure # type: ignore + + +def convert_to_native_paths(lst): + """ + Converts a list of '/' separated paths into a list of + native (os.sep separated) paths and converts to lowercase + if the system is case insensitive. + """ + newlst = [] + for rv in lst: + rv = os.path.join(*rv.split("/")) + # on windows the slash after the colon is dropped + if sys.platform == "win32": + pos = rv.find(':') + if pos != -1: + if rv[pos + 1] != '\\': + rv = rv[:pos + 1] + '\\' + rv[pos + 1:] + newlst.append(os.path.normcase(rv)) + return newlst + + +def get_sympy_dir(): + """ + Returns the root SymPy directory and set the global value + indicating whether the system is case sensitive or not. + """ + this_file = os.path.abspath(__file__) + sympy_dir = os.path.join(os.path.dirname(this_file), "..", "..") + sympy_dir = os.path.normpath(sympy_dir) + return os.path.normcase(sympy_dir) + + +def setup_pprint(disable_line_wrap=True): + from sympy.interactive.printing import init_printing + from sympy.printing.pretty.pretty import pprint_use_unicode + import sympy.interactive.printing as interactive_printing + from sympy.printing.pretty import stringpict + + # Prevent init_printing() in doctests from affecting other doctests + interactive_printing.NO_GLOBAL = True + + # force pprint to be in ascii mode in doctests + use_unicode_prev = pprint_use_unicode(False) + + # disable line wrapping for pprint() outputs + wrap_line_prev = stringpict._GLOBAL_WRAP_LINE + if disable_line_wrap: + stringpict._GLOBAL_WRAP_LINE = False + + # hook our nice, hash-stable strprinter + init_printing(pretty_print=False) + + return use_unicode_prev, wrap_line_prev + + +@contextmanager +def raise_on_deprecated(): + """Context manager to make DeprecationWarning raise an error + + This is to catch SymPyDeprecationWarning from library code while running + tests and doctests. It is important to use this context manager around + each individual test/doctest in case some tests modify the warning + filters. + """ + with warnings.catch_warnings(): + warnings.filterwarnings('error', '.*', DeprecationWarning, module='sympy.*') + yield + + +def run_in_subprocess_with_hash_randomization( + function, function_args=(), + function_kwargs=None, command=sys.executable, + module='sympy.testing.runtests', force=False): + """ + Run a function in a Python subprocess with hash randomization enabled. + + If hash randomization is not supported by the version of Python given, it + returns False. Otherwise, it returns the exit value of the command. The + function is passed to sys.exit(), so the return value of the function will + be the return value. + + The environment variable PYTHONHASHSEED is used to seed Python's hash + randomization. If it is set, this function will return False, because + starting a new subprocess is unnecessary in that case. If it is not set, + one is set at random, and the tests are run. Note that if this + environment variable is set when Python starts, hash randomization is + automatically enabled. To force a subprocess to be created even if + PYTHONHASHSEED is set, pass ``force=True``. This flag will not force a + subprocess in Python versions that do not support hash randomization (see + below), because those versions of Python do not support the ``-R`` flag. + + ``function`` should be a string name of a function that is importable from + the module ``module``, like "_test". The default for ``module`` is + "sympy.testing.runtests". ``function_args`` and ``function_kwargs`` + should be a repr-able tuple and dict, respectively. The default Python + command is sys.executable, which is the currently running Python command. + + This function is necessary because the seed for hash randomization must be + set by the environment variable before Python starts. Hence, in order to + use a predetermined seed for tests, we must start Python in a separate + subprocess. + + Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, + 3.1.5, and 3.2.3, and is enabled by default in all Python versions after + and including 3.3.0. + + Examples + ======== + + >>> from sympy.testing.runtests import ( + ... run_in_subprocess_with_hash_randomization) + >>> # run the core tests in verbose mode + >>> run_in_subprocess_with_hash_randomization("_test", + ... function_args=("core",), + ... function_kwargs={'verbose': True}) # doctest: +SKIP + # Will return 0 if sys.executable supports hash randomization and tests + # pass, 1 if they fail, and False if it does not support hash + # randomization. + + """ + cwd = get_sympy_dir() + # Note, we must return False everywhere, not None, as subprocess.call will + # sometimes return None. + + # First check if the Python version supports hash randomization + # If it does not have this support, it won't recognize the -R flag + p = subprocess.Popen([command, "-RV"], stdout=subprocess.PIPE, + stderr=subprocess.STDOUT, cwd=cwd) + p.communicate() + if p.returncode != 0: + return False + + hash_seed = os.getenv("PYTHONHASHSEED") + if not hash_seed: + os.environ["PYTHONHASHSEED"] = str(random.randrange(2**32)) + else: + if not force: + return False + + function_kwargs = function_kwargs or {} + + # Now run the command + commandstring = ("import sys; from %s import %s;sys.exit(%s(*%s, **%s))" % + (module, function, function, repr(function_args), + repr(function_kwargs))) + + try: + p = subprocess.Popen([command, "-R", "-c", commandstring], cwd=cwd) + p.communicate() + except KeyboardInterrupt: + p.wait() + finally: + # Put the environment variable back, so that it reads correctly for + # the current Python process. + if hash_seed is None: + del os.environ["PYTHONHASHSEED"] + else: + os.environ["PYTHONHASHSEED"] = hash_seed + return p.returncode + + +def run_all_tests(test_args=(), test_kwargs=None, + doctest_args=(), doctest_kwargs=None, + examples_args=(), examples_kwargs=None): + """ + Run all tests. + + Right now, this runs the regular tests (bin/test), the doctests + (bin/doctest), and the examples (examples/all.py). + + This is what ``setup.py test`` uses. + + You can pass arguments and keyword arguments to the test functions that + support them (for now, test, doctest, and the examples). See the + docstrings of those functions for a description of the available options. + + For example, to run the solvers tests with colors turned off: + + >>> from sympy.testing.runtests import run_all_tests + >>> run_all_tests(test_args=("solvers",), + ... test_kwargs={"colors:False"}) # doctest: +SKIP + + """ + tests_successful = True + + test_kwargs = test_kwargs or {} + doctest_kwargs = doctest_kwargs or {} + examples_kwargs = examples_kwargs or {'quiet': True} + + try: + # Regular tests + if not test(*test_args, **test_kwargs): + # some regular test fails, so set the tests_successful + # flag to false and continue running the doctests + tests_successful = False + + # Doctests + print() + if not doctest(*doctest_args, **doctest_kwargs): + tests_successful = False + + # Examples + print() + sys.path.append("examples") # examples/all.py + from all import run_examples # type: ignore + if not run_examples(*examples_args, **examples_kwargs): + tests_successful = False + + if tests_successful: + return + else: + # Return nonzero exit code + sys.exit(1) + except KeyboardInterrupt: + print() + print("DO *NOT* COMMIT!") + sys.exit(1) + + +def test(*paths, subprocess=True, rerun=0, **kwargs): + """ + Run tests in the specified test_*.py files. + + Tests in a particular test_*.py file are run if any of the given strings + in ``paths`` matches a part of the test file's path. If ``paths=[]``, + tests in all test_*.py files are run. + + Notes: + + - If sort=False, tests are run in random order (not default). + - Paths can be entered in native system format or in unix, + forward-slash format. + - Files that are on the blacklist can be tested by providing + their path; they are only excluded if no paths are given. + + **Explanation of test results** + + ====== =============================================================== + Output Meaning + ====== =============================================================== + . passed + F failed + X XPassed (expected to fail but passed) + f XFAILed (expected to fail and indeed failed) + s skipped + w slow + T timeout (e.g., when ``--timeout`` is used) + K KeyboardInterrupt (when running the slow tests with ``--slow``, + you can interrupt one of them without killing the test runner) + ====== =============================================================== + + + Colors have no additional meaning and are used just to facilitate + interpreting the output. + + Examples + ======== + + >>> import sympy + + Run all tests: + + >>> sympy.test() # doctest: +SKIP + + Run one file: + + >>> sympy.test("sympy/core/tests/test_basic.py") # doctest: +SKIP + >>> sympy.test("_basic") # doctest: +SKIP + + Run all tests in sympy/functions/ and some particular file: + + >>> sympy.test("sympy/core/tests/test_basic.py", + ... "sympy/functions") # doctest: +SKIP + + Run all tests in sympy/core and sympy/utilities: + + >>> sympy.test("/core", "/util") # doctest: +SKIP + + Run specific test from a file: + + >>> sympy.test("sympy/core/tests/test_basic.py", + ... kw="test_equality") # doctest: +SKIP + + Run specific test from any file: + + >>> sympy.test(kw="subs") # doctest: +SKIP + + Run the tests with verbose mode on: + + >>> sympy.test(verbose=True) # doctest: +SKIP + + Do not sort the test output: + + >>> sympy.test(sort=False) # doctest: +SKIP + + Turn on post-mortem pdb: + + >>> sympy.test(pdb=True) # doctest: +SKIP + + Turn off colors: + + >>> sympy.test(colors=False) # doctest: +SKIP + + Force colors, even when the output is not to a terminal (this is useful, + e.g., if you are piping to ``less -r`` and you still want colors) + + >>> sympy.test(force_colors=False) # doctest: +SKIP + + The traceback verboseness can be set to "short" or "no" (default is + "short") + + >>> sympy.test(tb='no') # doctest: +SKIP + + The ``split`` option can be passed to split the test run into parts. The + split currently only splits the test files, though this may change in the + future. ``split`` should be a string of the form 'a/b', which will run + part ``a`` of ``b``. For instance, to run the first half of the test suite: + + >>> sympy.test(split='1/2') # doctest: +SKIP + + The ``time_balance`` option can be passed in conjunction with ``split``. + If ``time_balance=True`` (the default for ``sympy.test``), SymPy will attempt + to split the tests such that each split takes equal time. This heuristic + for balancing is based on pre-recorded test data. + + >>> sympy.test(split='1/2', time_balance=True) # doctest: +SKIP + + You can disable running the tests in a separate subprocess using + ``subprocess=False``. This is done to support seeding hash randomization, + which is enabled by default in the Python versions where it is supported. + If subprocess=False, hash randomization is enabled/disabled according to + whether it has been enabled or not in the calling Python process. + However, even if it is enabled, the seed cannot be printed unless it is + called from a new Python process. + + Hash randomization was added in the minor Python versions 2.6.8, 2.7.3, + 3.1.5, and 3.2.3, and is enabled by default in all Python versions after + and including 3.3.0. + + If hash randomization is not supported ``subprocess=False`` is used + automatically. + + >>> sympy.test(subprocess=False) # doctest: +SKIP + + To set the hash randomization seed, set the environment variable + ``PYTHONHASHSEED`` before running the tests. This can be done from within + Python using + + >>> import os + >>> os.environ['PYTHONHASHSEED'] = '42' # doctest: +SKIP + + Or from the command line using + + $ PYTHONHASHSEED=42 ./bin/test + + If the seed is not set, a random seed will be chosen. + + Note that to reproduce the same hash values, you must use both the same seed + as well as the same architecture (32-bit vs. 64-bit). + + """ + # count up from 0, do not print 0 + print_counter = lambda i : (print("rerun %d" % (rerun-i)) + if rerun-i else None) + + if subprocess: + # loop backwards so last i is 0 + for i in range(rerun, -1, -1): + print_counter(i) + ret = run_in_subprocess_with_hash_randomization("_test", + function_args=paths, function_kwargs=kwargs) + if ret is False: + break + val = not bool(ret) + # exit on the first failure or if done + if not val or i == 0: + return val + + # rerun even if hash randomization is not supported + for i in range(rerun, -1, -1): + print_counter(i) + val = not bool(_test(*paths, **kwargs)) + if not val or i == 0: + return val + + +def _test(*paths, + verbose=False, tb="short", kw=None, pdb=False, colors=True, + force_colors=False, sort=True, seed=None, timeout=False, + fail_on_timeout=False, slow=False, enhance_asserts=False, split=None, + time_balance=True, blacklist=(), + fast_threshold=None, slow_threshold=None): + """ + Internal function that actually runs the tests. + + All keyword arguments from ``test()`` are passed to this function except for + ``subprocess``. + + Returns 0 if tests passed and 1 if they failed. See the docstring of + ``test()`` for more information. + """ + kw = kw or () + # ensure that kw is a tuple + if isinstance(kw, str): + kw = (kw,) + post_mortem = pdb + if seed is None: + seed = random.randrange(100000000) + if ON_CI and timeout is False: + timeout = 595 + fail_on_timeout = True + if ON_CI: + blacklist = list(blacklist) + ['sympy/plotting/pygletplot/tests'] + blacklist = convert_to_native_paths(blacklist) + r = PyTestReporter(verbose=verbose, tb=tb, colors=colors, + force_colors=force_colors, split=split) + # This won't strictly run the test for the corresponding file, but it is + # good enough for copying and pasting the failing test. + _paths = [] + for path in paths: + if '::' in path: + path, _kw = path.split('::', 1) + kw += (_kw,) + _paths.append(path) + paths = _paths + + t = SymPyTests(r, kw, post_mortem, seed, + fast_threshold=fast_threshold, + slow_threshold=slow_threshold) + + test_files = t.get_test_files('sympy') + + not_blacklisted = [f for f in test_files + if not any(b in f for b in blacklist)] + + if len(paths) == 0: + matched = not_blacklisted + else: + paths = convert_to_native_paths(paths) + matched = [] + for f in not_blacklisted: + basename = os.path.basename(f) + for p in paths: + if p in f or fnmatch(basename, p): + matched.append(f) + break + + density = None + if time_balance: + if slow: + density = SPLIT_DENSITY_SLOW + else: + density = SPLIT_DENSITY + + if split: + matched = split_list(matched, split, density=density) + + t._testfiles.extend(matched) + + return int(not t.test(sort=sort, timeout=timeout, slow=slow, + enhance_asserts=enhance_asserts, fail_on_timeout=fail_on_timeout)) + + +def doctest(*paths, subprocess=True, rerun=0, **kwargs): + r""" + Runs doctests in all \*.py files in the SymPy directory which match + any of the given strings in ``paths`` or all tests if paths=[]. + + Notes: + + - Paths can be entered in native system format or in unix, + forward-slash format. + - Files that are on the blacklist can be tested by providing + their path; they are only excluded if no paths are given. + + Examples + ======== + + >>> import sympy + + Run all tests: + + >>> sympy.doctest() # doctest: +SKIP + + Run one file: + + >>> sympy.doctest("sympy/core/basic.py") # doctest: +SKIP + >>> sympy.doctest("polynomial.rst") # doctest: +SKIP + + Run all tests in sympy/functions/ and some particular file: + + >>> sympy.doctest("/functions", "basic.py") # doctest: +SKIP + + Run any file having polynomial in its name, doc/src/modules/polynomial.rst, + sympy/functions/special/polynomials.py, and sympy/polys/polynomial.py: + + >>> sympy.doctest("polynomial") # doctest: +SKIP + + The ``split`` option can be passed to split the test run into parts. The + split currently only splits the test files, though this may change in the + future. ``split`` should be a string of the form 'a/b', which will run + part ``a`` of ``b``. Note that the regular doctests and the Sphinx + doctests are split independently. For instance, to run the first half of + the test suite: + + >>> sympy.doctest(split='1/2') # doctest: +SKIP + + The ``subprocess`` and ``verbose`` options are the same as with the function + ``test()`` (see the docstring of that function for more information) except + that ``verbose`` may also be set equal to ``2`` in order to print + individual doctest lines, as they are being tested. + """ + # count up from 0, do not print 0 + print_counter = lambda i : (print("rerun %d" % (rerun-i)) + if rerun-i else None) + + if subprocess: + # loop backwards so last i is 0 + for i in range(rerun, -1, -1): + print_counter(i) + ret = run_in_subprocess_with_hash_randomization("_doctest", + function_args=paths, function_kwargs=kwargs) + if ret is False: + break + val = not bool(ret) + # exit on the first failure or if done + if not val or i == 0: + return val + + # rerun even if hash randomization is not supported + for i in range(rerun, -1, -1): + print_counter(i) + val = not bool(_doctest(*paths, **kwargs)) + if not val or i == 0: + return val + + +def _get_doctest_blacklist(): + '''Get the default blacklist for the doctests''' + blacklist = [] + + blacklist.extend([ + "doc/src/modules/plotting.rst", # generates live plots + "doc/src/modules/physics/mechanics/autolev_parser.rst", + "sympy/codegen/array_utils.py", # raises deprecation warning + "sympy/core/compatibility.py", # backwards compatibility shim, importing it triggers a deprecation warning + "sympy/core/trace.py", # backwards compatibility shim, importing it triggers a deprecation warning + "sympy/galgebra.py", # no longer part of SymPy + "sympy/parsing/autolev/_antlr/autolevlexer.py", # generated code + "sympy/parsing/autolev/_antlr/autolevlistener.py", # generated code + "sympy/parsing/autolev/_antlr/autolevparser.py", # generated code + "sympy/parsing/latex/_antlr/latexlexer.py", # generated code + "sympy/parsing/latex/_antlr/latexparser.py", # generated code + "sympy/plotting/pygletplot/__init__.py", # crashes on some systems + "sympy/plotting/pygletplot/plot.py", # crashes on some systems + "sympy/printing/ccode.py", # backwards compatibility shim, importing it breaks the codegen doctests + "sympy/printing/cxxcode.py", # backwards compatibility shim, importing it breaks the codegen doctests + "sympy/printing/fcode.py", # backwards compatibility shim, importing it breaks the codegen doctests + "sympy/testing/randtest.py", # backwards compatibility shim, importing it triggers a deprecation warning + "sympy/this.py", # prints text + ]) + # autolev parser tests + num = 12 + for i in range (1, num+1): + blacklist.append("sympy/parsing/autolev/test-examples/ruletest" + str(i) + ".py") + blacklist.extend(["sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py", + "sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py", + "sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py", + "sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py"]) + + if import_module('numpy') is None: + blacklist.extend([ + "sympy/plotting/experimental_lambdify.py", + "sympy/plotting/plot_implicit.py", + "examples/advanced/autowrap_integrators.py", + "examples/advanced/autowrap_ufuncify.py", + "examples/intermediate/sample.py", + "examples/intermediate/mplot2d.py", + "examples/intermediate/mplot3d.py", + "doc/src/modules/numeric-computation.rst", + "doc/src/explanation/best-practices.md", + "doc/src/tutorials/physics/biomechanics/biomechanical-model-example.rst", + "doc/src/tutorials/physics/biomechanics/biomechanics.rst", + ]) + else: + if import_module('matplotlib') is None: + blacklist.extend([ + "examples/intermediate/mplot2d.py", + "examples/intermediate/mplot3d.py" + ]) + else: + # Use a non-windowed backend, so that the tests work on CI + import matplotlib + matplotlib.use('Agg') + + if ON_CI or import_module('pyglet') is None: + blacklist.extend(["sympy/plotting/pygletplot"]) + + if import_module('aesara') is None: + blacklist.extend([ + "sympy/printing/aesaracode.py", + "doc/src/modules/numeric-computation.rst", + ]) + + if import_module('cupy') is None: + blacklist.extend([ + "doc/src/modules/numeric-computation.rst", + ]) + + if import_module('jax') is None: + blacklist.extend([ + "doc/src/modules/numeric-computation.rst", + ]) + + if import_module('antlr4') is None: + blacklist.extend([ + "sympy/parsing/autolev/__init__.py", + "sympy/parsing/latex/_parse_latex_antlr.py", + ]) + + if import_module('lfortran') is None: + #throws ImportError when lfortran not installed + blacklist.extend([ + "sympy/parsing/sym_expr.py", + ]) + + if import_module("scipy") is None: + # throws ModuleNotFoundError when scipy not installed + blacklist.extend([ + "doc/src/guides/solving/solve-numerically.md", + "doc/src/guides/solving/solve-ode.md", + ]) + + if import_module("numpy") is None: + # throws ModuleNotFoundError when numpy not installed + blacklist.extend([ + "doc/src/guides/solving/solve-ode.md", + "doc/src/guides/solving/solve-numerically.md", + ]) + + # disabled because of doctest failures in asmeurer's bot + blacklist.extend([ + "sympy/utilities/autowrap.py", + "examples/advanced/autowrap_integrators.py", + "examples/advanced/autowrap_ufuncify.py" + ]) + + blacklist.extend([ + "sympy/conftest.py", # Depends on pytest + ]) + + # These are deprecated stubs to be removed: + blacklist.extend([ + "sympy/utilities/tmpfiles.py", + "sympy/utilities/pytest.py", + "sympy/utilities/runtests.py", + "sympy/utilities/quality_unicode.py", + "sympy/utilities/randtest.py", + ]) + + blacklist = convert_to_native_paths(blacklist) + return blacklist + + +def _doctest(*paths, **kwargs): + """ + Internal function that actually runs the doctests. + + All keyword arguments from ``doctest()`` are passed to this function + except for ``subprocess``. + + Returns 0 if tests passed and 1 if they failed. See the docstrings of + ``doctest()`` and ``test()`` for more information. + """ + from sympy.printing.pretty.pretty import pprint_use_unicode + from sympy.printing.pretty import stringpict + + normal = kwargs.get("normal", False) + verbose = kwargs.get("verbose", False) + colors = kwargs.get("colors", True) + force_colors = kwargs.get("force_colors", False) + blacklist = kwargs.get("blacklist", []) + split = kwargs.get('split', None) + + blacklist.extend(_get_doctest_blacklist()) + + # Use a non-windowed backend, so that the tests work on CI + if import_module('matplotlib') is not None: + import matplotlib + matplotlib.use('Agg') + + # Disable warnings for external modules + import sympy.external + sympy.external.importtools.WARN_OLD_VERSION = False + sympy.external.importtools.WARN_NOT_INSTALLED = False + + # Disable showing up of plots + from sympy.plotting.plot import unset_show + unset_show() + + r = PyTestReporter(verbose, split=split, colors=colors,\ + force_colors=force_colors) + t = SymPyDocTests(r, normal) + + test_files = t.get_test_files('sympy') + test_files.extend(t.get_test_files('examples', init_only=False)) + + not_blacklisted = [f for f in test_files + if not any(b in f for b in blacklist)] + if len(paths) == 0: + matched = not_blacklisted + else: + # take only what was requested...but not blacklisted items + # and allow for partial match anywhere or fnmatch of name + paths = convert_to_native_paths(paths) + matched = [] + for f in not_blacklisted: + basename = os.path.basename(f) + for p in paths: + if p in f or fnmatch(basename, p): + matched.append(f) + break + + matched.sort() + + if split: + matched = split_list(matched, split) + + t._testfiles.extend(matched) + + # run the tests and record the result for this *py portion of the tests + if t._testfiles: + failed = not t.test() + else: + failed = False + + # N.B. + # -------------------------------------------------------------------- + # Here we test *.rst and *.md files at or below doc/src. Code from these + # must be self supporting in terms of imports since there is no importing + # of necessary modules by doctest.testfile. If you try to pass *.py files + # through this they might fail because they will lack the needed imports + # and smarter parsing that can be done with source code. + # + test_files_rst = t.get_test_files('doc/src', '*.rst', init_only=False) + test_files_md = t.get_test_files('doc/src', '*.md', init_only=False) + test_files = test_files_rst + test_files_md + test_files.sort() + + not_blacklisted = [f for f in test_files + if not any(b in f for b in blacklist)] + + if len(paths) == 0: + matched = not_blacklisted + else: + # Take only what was requested as long as it's not on the blacklist. + # Paths were already made native in *py tests so don't repeat here. + # There's no chance of having a *py file slip through since we + # only have *rst files in test_files. + matched = [] + for f in not_blacklisted: + basename = os.path.basename(f) + for p in paths: + if p in f or fnmatch(basename, p): + matched.append(f) + break + + if split: + matched = split_list(matched, split) + + first_report = True + for rst_file in matched: + if not os.path.isfile(rst_file): + continue + old_displayhook = sys.displayhook + try: + use_unicode_prev, wrap_line_prev = setup_pprint() + out = sympytestfile( + rst_file, module_relative=False, encoding='utf-8', + optionflags=pdoctest.ELLIPSIS | pdoctest.NORMALIZE_WHITESPACE | + pdoctest.IGNORE_EXCEPTION_DETAIL) + finally: + # make sure we return to the original displayhook in case some + # doctest has changed that + sys.displayhook = old_displayhook + # The NO_GLOBAL flag overrides the no_global flag to init_printing + # if True + import sympy.interactive.printing as interactive_printing + interactive_printing.NO_GLOBAL = False + pprint_use_unicode(use_unicode_prev) + stringpict._GLOBAL_WRAP_LINE = wrap_line_prev + + rstfailed, tested = out + if tested: + failed = rstfailed or failed + if first_report: + first_report = False + msg = 'rst/md doctests start' + if not t._testfiles: + r.start(msg=msg) + else: + r.write_center(msg) + print() + # use as the id, everything past the first 'sympy' + file_id = rst_file[rst_file.find('sympy') + len('sympy') + 1:] + print(file_id, end=" ") + # get at least the name out so it is know who is being tested + wid = r.terminal_width - len(file_id) - 1 # update width + test_file = '[%s]' % (tested) + report = '[%s]' % (rstfailed or 'OK') + print(''.join( + [test_file, ' '*(wid - len(test_file) - len(report)), report]) + ) + + # the doctests for *py will have printed this message already if there was + # a failure, so now only print it if there was intervening reporting by + # testing the *rst as evidenced by first_report no longer being True. + if not first_report and failed: + print() + print("DO *NOT* COMMIT!") + + return int(failed) + +sp = re.compile(r'([0-9]+)/([1-9][0-9]*)') + +def split_list(l, split, density=None): + """ + Splits a list into part a of b + + split should be a string of the form 'a/b'. For instance, '1/3' would give + the split one of three. + + If the length of the list is not divisible by the number of splits, the + last split will have more items. + + `density` may be specified as a list. If specified, + tests will be balanced so that each split has as equal-as-possible + amount of mass according to `density`. + + >>> from sympy.testing.runtests import split_list + >>> a = list(range(10)) + >>> split_list(a, '1/3') + [0, 1, 2] + >>> split_list(a, '2/3') + [3, 4, 5] + >>> split_list(a, '3/3') + [6, 7, 8, 9] + """ + m = sp.match(split) + if not m: + raise ValueError("split must be a string of the form a/b where a and b are ints") + i, t = map(int, m.groups()) + + if not density: + return l[(i - 1)*len(l)//t : i*len(l)//t] + + # normalize density + tot = sum(density) + density = [x / tot for x in density] + + def density_inv(x): + """Interpolate the inverse to the cumulative + distribution function given by density""" + if x <= 0: + return 0 + if x >= sum(density): + return 1 + + # find the first time the cumulative sum surpasses x + # and linearly interpolate + cumm = 0 + for i, d in enumerate(density): + cumm += d + if cumm >= x: + break + frac = (d - (cumm - x)) / d + return (i + frac) / len(density) + + lower_frac = density_inv((i - 1) / t) + higher_frac = density_inv(i / t) + return l[int(lower_frac*len(l)) : int(higher_frac*len(l))] + +from collections import namedtuple +SymPyTestResults = namedtuple('SymPyTestResults', 'failed attempted') + +def sympytestfile(filename, module_relative=True, name=None, package=None, + globs=None, verbose=None, report=True, optionflags=0, + extraglobs=None, raise_on_error=False, + parser=pdoctest.DocTestParser(), encoding=None): + + """ + Test examples in the given file. Return (#failures, #tests). + + Optional keyword arg ``module_relative`` specifies how filenames + should be interpreted: + + - If ``module_relative`` is True (the default), then ``filename`` + specifies a module-relative path. By default, this path is + relative to the calling module's directory; but if the + ``package`` argument is specified, then it is relative to that + package. To ensure os-independence, ``filename`` should use + "/" characters to separate path segments, and should not + be an absolute path (i.e., it may not begin with "/"). + + - If ``module_relative`` is False, then ``filename`` specifies an + os-specific path. The path may be absolute or relative (to + the current working directory). + + Optional keyword arg ``name`` gives the name of the test; by default + use the file's basename. + + Optional keyword argument ``package`` is a Python package or the + name of a Python package whose directory should be used as the + base directory for a module relative filename. If no package is + specified, then the calling module's directory is used as the base + directory for module relative filenames. It is an error to + specify ``package`` if ``module_relative`` is False. + + Optional keyword arg ``globs`` gives a dict to be used as the globals + when executing examples; by default, use {}. A copy of this dict + is actually used for each docstring, so that each docstring's + examples start with a clean slate. + + Optional keyword arg ``extraglobs`` gives a dictionary that should be + merged into the globals that are used to execute examples. By + default, no extra globals are used. + + Optional keyword arg ``verbose`` prints lots of stuff if true, prints + only failures if false; by default, it's true iff "-v" is in sys.argv. + + Optional keyword arg ``report`` prints a summary at the end when true, + else prints nothing at the end. In verbose mode, the summary is + detailed, else very brief (in fact, empty if all tests passed). + + Optional keyword arg ``optionflags`` or's together module constants, + and defaults to 0. Possible values (see the docs for details): + + - DONT_ACCEPT_TRUE_FOR_1 + - DONT_ACCEPT_BLANKLINE + - NORMALIZE_WHITESPACE + - ELLIPSIS + - SKIP + - IGNORE_EXCEPTION_DETAIL + - REPORT_UDIFF + - REPORT_CDIFF + - REPORT_NDIFF + - REPORT_ONLY_FIRST_FAILURE + + Optional keyword arg ``raise_on_error`` raises an exception on the + first unexpected exception or failure. This allows failures to be + post-mortem debugged. + + Optional keyword arg ``parser`` specifies a DocTestParser (or + subclass) that should be used to extract tests from the files. + + Optional keyword arg ``encoding`` specifies an encoding that should + be used to convert the file to unicode. + + Advanced tomfoolery: testmod runs methods of a local instance of + class doctest.Tester, then merges the results into (or creates) + global Tester instance doctest.master. Methods of doctest.master + can be called directly too, if you want to do something unusual. + Passing report=0 to testmod is especially useful then, to delay + displaying a summary. Invoke doctest.master.summarize(verbose) + when you're done fiddling. + """ + if package and not module_relative: + raise ValueError("Package may only be specified for module-" + "relative paths.") + + # Relativize the path + text, filename = pdoctest._load_testfile( + filename, package, module_relative, encoding) + + # If no name was given, then use the file's name. + if name is None: + name = os.path.basename(filename) + + # Assemble the globals. + if globs is None: + globs = {} + else: + globs = globs.copy() + if extraglobs is not None: + globs.update(extraglobs) + if '__name__' not in globs: + globs['__name__'] = '__main__' + + if raise_on_error: + runner = pdoctest.DebugRunner(verbose=verbose, optionflags=optionflags) + else: + runner = SymPyDocTestRunner(verbose=verbose, optionflags=optionflags) + runner._checker = SymPyOutputChecker() + + # Read the file, convert it to a test, and run it. + test = parser.get_doctest(text, globs, name, filename, 0) + runner.run(test) + + if report: + runner.summarize() + + if pdoctest.master is None: + pdoctest.master = runner + else: + pdoctest.master.merge(runner) + + return SymPyTestResults(runner.failures, runner.tries) + + +class SymPyTests: + + def __init__(self, reporter, kw="", post_mortem=False, + seed=None, fast_threshold=None, slow_threshold=None): + self._post_mortem = post_mortem + self._kw = kw + self._count = 0 + self._root_dir = get_sympy_dir() + self._reporter = reporter + self._reporter.root_dir(self._root_dir) + self._testfiles = [] + self._seed = seed if seed is not None else random.random() + + # Defaults in seconds, from human / UX design limits + # http://www.nngroup.com/articles/response-times-3-important-limits/ + # + # These defaults are *NOT* set in stone as we are measuring different + # things, so others feel free to come up with a better yardstick :) + if fast_threshold: + self._fast_threshold = float(fast_threshold) + else: + self._fast_threshold = 8 + if slow_threshold: + self._slow_threshold = float(slow_threshold) + else: + self._slow_threshold = 10 + + def test(self, sort=False, timeout=False, slow=False, + enhance_asserts=False, fail_on_timeout=False): + """ + Runs the tests returning True if all tests pass, otherwise False. + + If sort=False run tests in random order. + """ + if sort: + self._testfiles.sort() + elif slow: + pass + else: + random.seed(self._seed) + random.shuffle(self._testfiles) + self._reporter.start(self._seed) + for f in self._testfiles: + try: + self.test_file(f, sort, timeout, slow, + enhance_asserts, fail_on_timeout) + except KeyboardInterrupt: + print(" interrupted by user") + self._reporter.finish() + raise + return self._reporter.finish() + + def _enhance_asserts(self, source): + from ast import (NodeTransformer, Compare, Name, Store, Load, Tuple, + Assign, BinOp, Str, Mod, Assert, parse, fix_missing_locations) + + ops = {"Eq": '==', "NotEq": '!=', "Lt": '<', "LtE": '<=', + "Gt": '>', "GtE": '>=', "Is": 'is', "IsNot": 'is not', + "In": 'in', "NotIn": 'not in'} + + class Transform(NodeTransformer): + def visit_Assert(self, stmt): + if isinstance(stmt.test, Compare): + compare = stmt.test + values = [compare.left] + compare.comparators + names = [ "_%s" % i for i, _ in enumerate(values) ] + names_store = [ Name(n, Store()) for n in names ] + names_load = [ Name(n, Load()) for n in names ] + target = Tuple(names_store, Store()) + value = Tuple(values, Load()) + assign = Assign([target], value) + new_compare = Compare(names_load[0], compare.ops, names_load[1:]) + msg_format = "\n%s " + "\n%s ".join([ ops[op.__class__.__name__] for op in compare.ops ]) + "\n%s" + msg = BinOp(Str(msg_format), Mod(), Tuple(names_load, Load())) + test = Assert(new_compare, msg, lineno=stmt.lineno, col_offset=stmt.col_offset) + return [assign, test] + else: + return stmt + + tree = parse(source) + new_tree = Transform().visit(tree) + return fix_missing_locations(new_tree) + + def test_file(self, filename, sort=True, timeout=False, slow=False, + enhance_asserts=False, fail_on_timeout=False): + reporter = self._reporter + funcs = [] + try: + gl = {'__file__': filename} + try: + open_file = lambda: open(filename, encoding="utf8") + + with open_file() as f: + source = f.read() + if self._kw: + for l in source.splitlines(): + if l.lstrip().startswith('def '): + if any(l.lower().find(k.lower()) != -1 for k in self._kw): + break + else: + return + + if enhance_asserts: + try: + source = self._enhance_asserts(source) + except ImportError: + pass + + code = compile(source, filename, "exec", flags=0, dont_inherit=True) + exec(code, gl) + except (SystemExit, KeyboardInterrupt): + raise + except ImportError: + reporter.import_error(filename, sys.exc_info()) + return + except Exception: + reporter.test_exception(sys.exc_info()) + + clear_cache() + self._count += 1 + random.seed(self._seed) + disabled = gl.get("disabled", False) + if not disabled: + # we need to filter only those functions that begin with 'test_' + # We have to be careful about decorated functions. As long as + # the decorator uses functools.wraps, we can detect it. + funcs = [] + for f in gl: + if (f.startswith("test_") and (inspect.isfunction(gl[f]) + or inspect.ismethod(gl[f]))): + func = gl[f] + # Handle multiple decorators + while hasattr(func, '__wrapped__'): + func = func.__wrapped__ + + if inspect.getsourcefile(func) == filename: + funcs.append(gl[f]) + if slow: + funcs = [f for f in funcs if getattr(f, '_slow', False)] + # Sorting of XFAILed functions isn't fixed yet :-( + funcs.sort(key=lambda x: inspect.getsourcelines(x)[1]) + i = 0 + while i < len(funcs): + if inspect.isgeneratorfunction(funcs[i]): + # some tests can be generators, that return the actual + # test functions. We unpack it below: + f = funcs.pop(i) + for fg in f(): + func = fg[0] + args = fg[1:] + fgw = lambda: func(*args) + funcs.insert(i, fgw) + i += 1 + else: + i += 1 + # drop functions that are not selected with the keyword expression: + funcs = [x for x in funcs if self.matches(x)] + + if not funcs: + return + except Exception: + reporter.entering_filename(filename, len(funcs)) + raise + + reporter.entering_filename(filename, len(funcs)) + if not sort: + random.shuffle(funcs) + + for f in funcs: + start = time.time() + reporter.entering_test(f) + try: + if getattr(f, '_slow', False) and not slow: + raise Skipped("Slow") + with raise_on_deprecated(): + if timeout: + self._timeout(f, timeout, fail_on_timeout) + else: + random.seed(self._seed) + f() + except KeyboardInterrupt: + if getattr(f, '_slow', False): + reporter.test_skip("KeyboardInterrupt") + else: + raise + except Exception: + if timeout: + signal.alarm(0) # Disable the alarm. It could not be handled before. + t, v, tr = sys.exc_info() + if t is AssertionError: + reporter.test_fail((t, v, tr)) + if self._post_mortem: + pdb.post_mortem(tr) + elif t.__name__ == "Skipped": + reporter.test_skip(v) + elif t.__name__ == "XFail": + reporter.test_xfail() + elif t.__name__ == "XPass": + reporter.test_xpass(v) + else: + reporter.test_exception((t, v, tr)) + if self._post_mortem: + pdb.post_mortem(tr) + else: + reporter.test_pass() + taken = time.time() - start + if taken > self._slow_threshold: + filename = os.path.relpath(filename, reporter._root_dir) + reporter.slow_test_functions.append( + (filename + "::" + f.__name__, taken)) + if getattr(f, '_slow', False) and slow: + if taken < self._fast_threshold: + filename = os.path.relpath(filename, reporter._root_dir) + reporter.fast_test_functions.append( + (filename + "::" + f.__name__, taken)) + reporter.leaving_filename() + + def _timeout(self, function, timeout, fail_on_timeout): + def callback(x, y): + signal.alarm(0) + if fail_on_timeout: + raise TimeOutError("Timed out after %d seconds" % timeout) + else: + raise Skipped("Timeout") + signal.signal(signal.SIGALRM, callback) + signal.alarm(timeout) # Set an alarm with a given timeout + function() + signal.alarm(0) # Disable the alarm + + def matches(self, x): + """ + Does the keyword expression self._kw match "x"? Returns True/False. + + Always returns True if self._kw is "". + """ + if not self._kw: + return True + for kw in self._kw: + if x.__name__.lower().find(kw.lower()) != -1: + return True + return False + + def get_test_files(self, dir, pat='test_*.py'): + """ + Returns the list of test_*.py (default) files at or below directory + ``dir`` relative to the SymPy home directory. + """ + dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) + + g = [] + for path, folders, files in os.walk(dir): + g.extend([os.path.join(path, f) for f in files if fnmatch(f, pat)]) + + return sorted([os.path.normcase(gi) for gi in g]) + + +class SymPyDocTests: + + def __init__(self, reporter, normal): + self._count = 0 + self._root_dir = get_sympy_dir() + self._reporter = reporter + self._reporter.root_dir(self._root_dir) + self._normal = normal + + self._testfiles = [] + + def test(self): + """ + Runs the tests and returns True if all tests pass, otherwise False. + """ + self._reporter.start() + for f in self._testfiles: + try: + self.test_file(f) + except KeyboardInterrupt: + print(" interrupted by user") + self._reporter.finish() + raise + return self._reporter.finish() + + def test_file(self, filename): + clear_cache() + + from io import StringIO + import sympy.interactive.printing as interactive_printing + from sympy.printing.pretty.pretty import pprint_use_unicode + from sympy.printing.pretty import stringpict + + rel_name = filename[len(self._root_dir) + 1:] + dirname, file = os.path.split(filename) + module = rel_name.replace(os.sep, '.')[:-3] + + if rel_name.startswith("examples"): + # Examples files do not have __init__.py files, + # So we have to temporarily extend sys.path to import them + sys.path.insert(0, dirname) + module = file[:-3] # remove ".py" + try: + module = pdoctest._normalize_module(module) + tests = SymPyDocTestFinder().find(module) + except (SystemExit, KeyboardInterrupt): + raise + except ImportError: + self._reporter.import_error(filename, sys.exc_info()) + return + finally: + if rel_name.startswith("examples"): + del sys.path[0] + + tests = [test for test in tests if len(test.examples) > 0] + # By default tests are sorted by alphabetical order by function name. + # We sort by line number so one can edit the file sequentially from + # bottom to top. However, if there are decorated functions, their line + # numbers will be too large and for now one must just search for these + # by text and function name. + tests.sort(key=lambda x: -x.lineno) + + if not tests: + return + self._reporter.entering_filename(filename, len(tests)) + for test in tests: + assert len(test.examples) != 0 + + if self._reporter._verbose: + self._reporter.write("\n{} ".format(test.name)) + + # check if there are external dependencies which need to be met + if '_doctest_depends_on' in test.globs: + try: + self._check_dependencies(**test.globs['_doctest_depends_on']) + except DependencyError as e: + self._reporter.test_skip(v=str(e)) + continue + + runner = SymPyDocTestRunner(verbose=self._reporter._verbose==2, + optionflags=pdoctest.ELLIPSIS | + pdoctest.NORMALIZE_WHITESPACE | + pdoctest.IGNORE_EXCEPTION_DETAIL) + runner._checker = SymPyOutputChecker() + old = sys.stdout + new = old if self._reporter._verbose==2 else StringIO() + sys.stdout = new + # If the testing is normal, the doctests get importing magic to + # provide the global namespace. If not normal (the default) then + # then must run on their own; all imports must be explicit within + # a function's docstring. Once imported that import will be + # available to the rest of the tests in a given function's + # docstring (unless clear_globs=True below). + if not self._normal: + test.globs = {} + # if this is uncommented then all the test would get is what + # comes by default with a "from sympy import *" + #exec('from sympy import *') in test.globs + old_displayhook = sys.displayhook + use_unicode_prev, wrap_line_prev = setup_pprint() + + try: + f, t = runner.run(test, + out=new.write, clear_globs=False) + except KeyboardInterrupt: + raise + finally: + sys.stdout = old + if f > 0: + self._reporter.doctest_fail(test.name, new.getvalue()) + else: + self._reporter.test_pass() + sys.displayhook = old_displayhook + interactive_printing.NO_GLOBAL = False + pprint_use_unicode(use_unicode_prev) + stringpict._GLOBAL_WRAP_LINE = wrap_line_prev + + self._reporter.leaving_filename() + + def get_test_files(self, dir, pat='*.py', init_only=True): + r""" + Returns the list of \*.py files (default) from which docstrings + will be tested which are at or below directory ``dir``. By default, + only those that have an __init__.py in their parent directory + and do not start with ``test_`` will be included. + """ + def importable(x): + """ + Checks if given pathname x is an importable module by checking for + __init__.py file. + + Returns True/False. + + Currently we only test if the __init__.py file exists in the + directory with the file "x" (in theory we should also test all the + parent dirs). + """ + init_py = os.path.join(os.path.dirname(x), "__init__.py") + return os.path.exists(init_py) + + dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0]) + + g = [] + for path, folders, files in os.walk(dir): + g.extend([os.path.join(path, f) for f in files + if not f.startswith('test_') and fnmatch(f, pat)]) + if init_only: + # skip files that are not importable (i.e. missing __init__.py) + g = [x for x in g if importable(x)] + + return [os.path.normcase(gi) for gi in g] + + def _check_dependencies(self, + executables=(), + modules=(), + disable_viewers=(), + python_version=(3, 5), + ground_types=None): + """ + Checks if the dependencies for the test are installed. + + Raises ``DependencyError`` it at least one dependency is not installed. + """ + + for executable in executables: + if not shutil.which(executable): + raise DependencyError("Could not find %s" % executable) + + for module in modules: + if module == 'matplotlib': + matplotlib = import_module( + 'matplotlib', + import_kwargs={'fromlist': + ['pyplot', 'cm', 'collections']}, + min_module_version='1.0.0', catch=(RuntimeError,)) + if matplotlib is None: + raise DependencyError("Could not import matplotlib") + else: + if not import_module(module): + raise DependencyError("Could not import %s" % module) + + if disable_viewers: + tempdir = tempfile.mkdtemp() + os.environ['PATH'] = '%s:%s' % (tempdir, os.environ['PATH']) + + vw = ('#!/usr/bin/env python3\n' + 'import sys\n' + 'if len(sys.argv) <= 1:\n' + ' exit("wrong number of args")\n') + + for viewer in disable_viewers: + Path(os.path.join(tempdir, viewer)).write_text(vw) + + # make the file executable + os.chmod(os.path.join(tempdir, viewer), + stat.S_IREAD | stat.S_IWRITE | stat.S_IXUSR) + + if python_version: + if sys.version_info < python_version: + raise DependencyError("Requires Python >= " + '.'.join(map(str, python_version))) + + if ground_types is not None: + if GROUND_TYPES not in ground_types: + raise DependencyError("Requires ground_types in " + str(ground_types)) + + if 'pyglet' in modules: + # monkey-patch pyglet s.t. it does not open a window during + # doctesting + import pyglet + class DummyWindow: + def __init__(self, *args, **kwargs): + self.has_exit = True + self.width = 600 + self.height = 400 + + def set_vsync(self, x): + pass + + def switch_to(self): + pass + + def push_handlers(self, x): + pass + + def close(self): + pass + + pyglet.window.Window = DummyWindow + + +class SymPyDocTestFinder(DocTestFinder): + """ + A class used to extract the DocTests that are relevant to a given + object, from its docstring and the docstrings of its contained + objects. Doctests can currently be extracted from the following + object types: modules, functions, classes, methods, staticmethods, + classmethods, and properties. + + Modified from doctest's version to look harder for code that + appears comes from a different module. For example, the @vectorize + decorator makes it look like functions come from multidimensional.py + even though their code exists elsewhere. + """ + + def _find(self, tests, obj, name, module, source_lines, globs, seen): + """ + Find tests for the given object and any contained objects, and + add them to ``tests``. + """ + if self._verbose: + print('Finding tests in %s' % name) + + # If we've already processed this object, then ignore it. + if id(obj) in seen: + return + seen[id(obj)] = 1 + + # Make sure we don't run doctests for classes outside of sympy, such + # as in numpy or scipy. + if inspect.isclass(obj): + if obj.__module__.split('.')[0] != 'sympy': + return + + # Find a test for this object, and add it to the list of tests. + test = self._get_test(obj, name, module, globs, source_lines) + if test is not None: + tests.append(test) + + if not self._recurse: + return + + # Look for tests in a module's contained objects. + if inspect.ismodule(obj): + for rawname, val in obj.__dict__.items(): + # Recurse to functions & classes. + if inspect.isfunction(val) or inspect.isclass(val): + # Make sure we don't run doctests functions or classes + # from different modules + if val.__module__ != module.__name__: + continue + + assert self._from_module(module, val), \ + "%s is not in module %s (rawname %s)" % (val, module, rawname) + + try: + valname = '%s.%s' % (name, rawname) + self._find(tests, val, valname, module, + source_lines, globs, seen) + except KeyboardInterrupt: + raise + + # Look for tests in a module's __test__ dictionary. + for valname, val in getattr(obj, '__test__', {}).items(): + if not isinstance(valname, str): + raise ValueError("SymPyDocTestFinder.find: __test__ keys " + "must be strings: %r" % + (type(valname),)) + if not (inspect.isfunction(val) or inspect.isclass(val) or + inspect.ismethod(val) or inspect.ismodule(val) or + isinstance(val, str)): + raise ValueError("SymPyDocTestFinder.find: __test__ values " + "must be strings, functions, methods, " + "classes, or modules: %r" % + (type(val),)) + valname = '%s.__test__.%s' % (name, valname) + self._find(tests, val, valname, module, source_lines, + globs, seen) + + + # Look for tests in a class's contained objects. + if inspect.isclass(obj): + for valname, val in obj.__dict__.items(): + # Special handling for staticmethod/classmethod. + if isinstance(val, staticmethod): + val = getattr(obj, valname) + if isinstance(val, classmethod): + val = getattr(obj, valname).__func__ + + + # Recurse to methods, properties, and nested classes. + if ((inspect.isfunction(unwrap(val)) or + inspect.isclass(val) or + isinstance(val, property)) and + self._from_module(module, val)): + # Make sure we don't run doctests functions or classes + # from different modules + if isinstance(val, property): + if hasattr(val.fget, '__module__'): + if val.fget.__module__ != module.__name__: + continue + else: + if val.__module__ != module.__name__: + continue + + assert self._from_module(module, val), \ + "%s is not in module %s (valname %s)" % ( + val, module, valname) + + valname = '%s.%s' % (name, valname) + self._find(tests, val, valname, module, source_lines, + globs, seen) + + def _get_test(self, obj, name, module, globs, source_lines): + """ + Return a DocTest for the given object, if it defines a docstring; + otherwise, return None. + """ + + lineno = None + + # Extract the object's docstring. If it does not have one, + # then return None (no test for this object). + if isinstance(obj, str): + # obj is a string in the case for objects in the polys package. + # Note that source_lines is a binary string (compiled polys + # modules), which can't be handled by _find_lineno so determine + # the line number here. + + docstring = obj + + matches = re.findall(r"line \d+", name) + assert len(matches) == 1, \ + "string '%s' does not contain lineno " % name + + # NOTE: this is not the exact linenumber but its better than no + # lineno ;) + lineno = int(matches[0][5:]) + + else: + docstring = getattr(obj, '__doc__', '') + if docstring is None: + docstring = '' + if not isinstance(docstring, str): + docstring = str(docstring) + + # Don't bother if the docstring is empty. + if self._exclude_empty and not docstring: + return None + + # check that properties have a docstring because _find_lineno + # assumes it + if isinstance(obj, property): + if obj.fget.__doc__ is None: + return None + + # Find the docstring's location in the file. + if lineno is None: + obj = unwrap(obj) + # handling of properties is not implemented in _find_lineno so do + # it here + if hasattr(obj, 'func_closure') and obj.func_closure is not None: + tobj = obj.func_closure[0].cell_contents + elif isinstance(obj, property): + tobj = obj.fget + else: + tobj = obj + lineno = self._find_lineno(tobj, source_lines) + + if lineno is None: + return None + + # Return a DocTest for this object. + if module is None: + filename = None + else: + filename = getattr(module, '__file__', module.__name__) + if filename[-4:] in (".pyc", ".pyo"): + filename = filename[:-1] + + globs['_doctest_depends_on'] = getattr(obj, '_doctest_depends_on', {}) + + return self._parser.get_doctest(docstring, globs, name, + filename, lineno) + + +class SymPyDocTestRunner(DocTestRunner): + """ + A class used to run DocTest test cases, and accumulate statistics. + The ``run`` method is used to process a single DocTest case. It + returns a tuple ``(f, t)``, where ``t`` is the number of test cases + tried, and ``f`` is the number of test cases that failed. + + Modified from the doctest version to not reset the sys.displayhook (see + issue 5140). + + See the docstring of the original DocTestRunner for more information. + """ + + def run(self, test, compileflags=None, out=None, clear_globs=True): + """ + Run the examples in ``test``, and display the results using the + writer function ``out``. + + The examples are run in the namespace ``test.globs``. If + ``clear_globs`` is true (the default), then this namespace will + be cleared after the test runs, to help with garbage + collection. If you would like to examine the namespace after + the test completes, then use ``clear_globs=False``. + + ``compileflags`` gives the set of flags that should be used by + the Python compiler when running the examples. If not + specified, then it will default to the set of future-import + flags that apply to ``globs``. + + The output of each example is checked using + ``SymPyDocTestRunner.check_output``, and the results are + formatted by the ``SymPyDocTestRunner.report_*`` methods. + """ + self.test = test + + # Remove ``` from the end of example, which may appear in Markdown + # files + for example in test.examples: + example.want = example.want.replace('```\n', '') + example.exc_msg = example.exc_msg and example.exc_msg.replace('```\n', '') + + + if compileflags is None: + compileflags = pdoctest._extract_future_flags(test.globs) + + save_stdout = sys.stdout + if out is None: + out = save_stdout.write + sys.stdout = self._fakeout + + # Patch pdb.set_trace to restore sys.stdout during interactive + # debugging (so it's not still redirected to self._fakeout). + # Note that the interactive output will go to *our* + # save_stdout, even if that's not the real sys.stdout; this + # allows us to write test cases for the set_trace behavior. + save_set_trace = pdb.set_trace + self.debugger = pdoctest._OutputRedirectingPdb(save_stdout) + self.debugger.reset() + pdb.set_trace = self.debugger.set_trace + + # Patch linecache.getlines, so we can see the example's source + # when we're inside the debugger. + self.save_linecache_getlines = pdoctest.linecache.getlines + linecache.getlines = self.__patched_linecache_getlines + + # Fail for deprecation warnings + with raise_on_deprecated(): + try: + return self.__run(test, compileflags, out) + finally: + sys.stdout = save_stdout + pdb.set_trace = save_set_trace + linecache.getlines = self.save_linecache_getlines + if clear_globs: + test.globs.clear() + + +# We have to override the name mangled methods. +monkeypatched_methods = [ + 'patched_linecache_getlines', + 'run', + 'record_outcome' +] +for method in monkeypatched_methods: + oldname = '_DocTestRunner__' + method + newname = '_SymPyDocTestRunner__' + method + setattr(SymPyDocTestRunner, newname, getattr(DocTestRunner, oldname)) + + +class SymPyOutputChecker(pdoctest.OutputChecker): + """ + Compared to the OutputChecker from the stdlib our OutputChecker class + supports numerical comparison of floats occurring in the output of the + doctest examples + """ + + def __init__(self): + # NOTE OutputChecker is an old-style class with no __init__ method, + # so we can't call the base class version of __init__ here + + got_floats = r'(\d+\.\d*|\.\d+)' + + # floats in the 'want' string may contain ellipses + want_floats = got_floats + r'(\.{3})?' + + front_sep = r'\s|\+|\-|\*|,' + back_sep = front_sep + r'|j|e' + + fbeg = r'^%s(?=%s|$)' % (got_floats, back_sep) + fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, got_floats, back_sep) + self.num_got_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend)) + + fbeg = r'^%s(?=%s|$)' % (want_floats, back_sep) + fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, want_floats, back_sep) + self.num_want_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend)) + + def check_output(self, want, got, optionflags): + """ + Return True iff the actual output from an example (`got`) + matches the expected output (`want`). These strings are + always considered to match if they are identical; but + depending on what option flags the test runner is using, + several non-exact match types are also possible. See the + documentation for `TestRunner` for more information about + option flags. + """ + # Handle the common case first, for efficiency: + # if they're string-identical, always return true. + if got == want: + return True + + # TODO parse integers as well ? + # Parse floats and compare them. If some of the parsed floats contain + # ellipses, skip the comparison. + matches = self.num_got_rgx.finditer(got) + numbers_got = [match.group(1) for match in matches] # list of strs + matches = self.num_want_rgx.finditer(want) + numbers_want = [match.group(1) for match in matches] # list of strs + if len(numbers_got) != len(numbers_want): + return False + + if len(numbers_got) > 0: + nw_ = [] + for ng, nw in zip(numbers_got, numbers_want): + if '...' in nw: + nw_.append(ng) + continue + else: + nw_.append(nw) + + if abs(float(ng)-float(nw)) > 1e-5: + return False + + got = self.num_got_rgx.sub(r'%s', got) + got = got % tuple(nw_) + + # can be used as a special sequence to signify a + # blank line, unless the DONT_ACCEPT_BLANKLINE flag is used. + if not (optionflags & pdoctest.DONT_ACCEPT_BLANKLINE): + # Replace in want with a blank line. + want = re.sub(r'(?m)^%s\s*?$' % re.escape(pdoctest.BLANKLINE_MARKER), + '', want) + # If a line in got contains only spaces, then remove the + # spaces. + got = re.sub(r'(?m)^\s*?$', '', got) + if got == want: + return True + + # This flag causes doctest to ignore any differences in the + # contents of whitespace strings. Note that this can be used + # in conjunction with the ELLIPSIS flag. + if optionflags & pdoctest.NORMALIZE_WHITESPACE: + got = ' '.join(got.split()) + want = ' '.join(want.split()) + if got == want: + return True + + # The ELLIPSIS flag says to let the sequence "..." in `want` + # match any substring in `got`. + if optionflags & pdoctest.ELLIPSIS: + if pdoctest._ellipsis_match(want, got): + return True + + # We didn't find any match; return false. + return False + + +class Reporter: + """ + Parent class for all reporters. + """ + pass + + +class PyTestReporter(Reporter): + """ + Py.test like reporter. Should produce output identical to py.test. + """ + + def __init__(self, verbose=False, tb="short", colors=True, + force_colors=False, split=None): + self._verbose = verbose + self._tb_style = tb + self._colors = colors + self._force_colors = force_colors + self._xfailed = 0 + self._xpassed = [] + self._failed = [] + self._failed_doctest = [] + self._passed = 0 + self._skipped = 0 + self._exceptions = [] + self._terminal_width = None + self._default_width = 80 + self._split = split + self._active_file = '' + self._active_f = None + + # TODO: Should these be protected? + self.slow_test_functions = [] + self.fast_test_functions = [] + + # this tracks the x-position of the cursor (useful for positioning + # things on the screen), without the need for any readline library: + self._write_pos = 0 + self._line_wrap = False + + def root_dir(self, dir): + self._root_dir = dir + + @property + def terminal_width(self): + if self._terminal_width is not None: + return self._terminal_width + + def findout_terminal_width(): + if sys.platform == "win32": + # Windows support is based on: + # + # http://code.activestate.com/recipes/ + # 440694-determine-size-of-console-window-on-windows/ + + from ctypes import windll, create_string_buffer + + h = windll.kernel32.GetStdHandle(-12) + csbi = create_string_buffer(22) + res = windll.kernel32.GetConsoleScreenBufferInfo(h, csbi) + + if res: + import struct + (_, _, _, _, _, left, _, right, _, _, _) = \ + struct.unpack("hhhhHhhhhhh", csbi.raw) + return right - left + else: + return self._default_width + + if hasattr(sys.stdout, 'isatty') and not sys.stdout.isatty(): + return self._default_width # leave PIPEs alone + + try: + process = subprocess.Popen(['stty', '-a'], + stdout=subprocess.PIPE, + stderr=subprocess.PIPE) + stdout, stderr = process.communicate() + stdout = stdout.decode("utf-8") + except OSError: + pass + else: + # We support the following output formats from stty: + # + # 1) Linux -> columns 80 + # 2) OS X -> 80 columns + # 3) Solaris -> columns = 80 + + re_linux = r"columns\s+(?P\d+);" + re_osx = r"(?P\d+)\s*columns;" + re_solaris = r"columns\s+=\s+(?P\d+);" + + for regex in (re_linux, re_osx, re_solaris): + match = re.search(regex, stdout) + + if match is not None: + columns = match.group('columns') + + try: + width = int(columns) + except ValueError: + pass + if width != 0: + return width + + return self._default_width + + width = findout_terminal_width() + self._terminal_width = width + + return width + + def write(self, text, color="", align="left", width=None, + force_colors=False): + """ + Prints a text on the screen. + + It uses sys.stdout.write(), so no readline library is necessary. + + Parameters + ========== + + color : choose from the colors below, "" means default color + align : "left"/"right", "left" is a normal print, "right" is aligned on + the right-hand side of the screen, filled with spaces if + necessary + width : the screen width + + """ + color_templates = ( + ("Black", "0;30"), + ("Red", "0;31"), + ("Green", "0;32"), + ("Brown", "0;33"), + ("Blue", "0;34"), + ("Purple", "0;35"), + ("Cyan", "0;36"), + ("LightGray", "0;37"), + ("DarkGray", "1;30"), + ("LightRed", "1;31"), + ("LightGreen", "1;32"), + ("Yellow", "1;33"), + ("LightBlue", "1;34"), + ("LightPurple", "1;35"), + ("LightCyan", "1;36"), + ("White", "1;37"), + ) + + colors = {} + + for name, value in color_templates: + colors[name] = value + c_normal = '\033[0m' + c_color = '\033[%sm' + + if width is None: + width = self.terminal_width + + if align == "right": + if self._write_pos + len(text) > width: + # we don't fit on the current line, create a new line + self.write("\n") + self.write(" "*(width - self._write_pos - len(text))) + + if not self._force_colors and hasattr(sys.stdout, 'isatty') and not \ + sys.stdout.isatty(): + # the stdout is not a terminal, this for example happens if the + # output is piped to less, e.g. "bin/test | less". In this case, + # the terminal control sequences would be printed verbatim, so + # don't use any colors. + color = "" + elif sys.platform == "win32": + # Windows consoles don't support ANSI escape sequences + color = "" + elif not self._colors: + color = "" + + if self._line_wrap: + if text[0] != "\n": + sys.stdout.write("\n") + + # Avoid UnicodeEncodeError when printing out test failures + if IS_WINDOWS: + text = text.encode('raw_unicode_escape').decode('utf8', 'ignore') + elif not sys.stdout.encoding.lower().startswith('utf'): + text = text.encode(sys.stdout.encoding, 'backslashreplace' + ).decode(sys.stdout.encoding) + + if color == "": + sys.stdout.write(text) + else: + sys.stdout.write("%s%s%s" % + (c_color % colors[color], text, c_normal)) + sys.stdout.flush() + l = text.rfind("\n") + if l == -1: + self._write_pos += len(text) + else: + self._write_pos = len(text) - l - 1 + self._line_wrap = self._write_pos >= width + self._write_pos %= width + + def write_center(self, text, delim="="): + width = self.terminal_width + if text != "": + text = " %s " % text + idx = (width - len(text)) // 2 + t = delim*idx + text + delim*(width - idx - len(text)) + self.write(t + "\n") + + def write_exception(self, e, val, tb): + # remove the first item, as that is always runtests.py + tb = tb.tb_next + t = traceback.format_exception(e, val, tb) + self.write("".join(t)) + + def start(self, seed=None, msg="test process starts"): + self.write_center(msg) + executable = sys.executable + v = tuple(sys.version_info) + python_version = "%s.%s.%s-%s-%s" % v + implementation = platform.python_implementation() + if implementation == 'PyPy': + implementation += " %s.%s.%s-%s-%s" % sys.pypy_version_info + self.write("executable: %s (%s) [%s]\n" % + (executable, python_version, implementation)) + from sympy.utilities.misc import ARCH + self.write("architecture: %s\n" % ARCH) + from sympy.core.cache import USE_CACHE + self.write("cache: %s\n" % USE_CACHE) + version = '' + if GROUND_TYPES =='gmpy': + import gmpy2 as gmpy + version = gmpy.version() + self.write("ground types: %s %s\n" % (GROUND_TYPES, version)) + numpy = import_module('numpy') + self.write("numpy: %s\n" % (None if not numpy else numpy.__version__)) + if seed is not None: + self.write("random seed: %d\n" % seed) + from sympy.utilities.misc import HASH_RANDOMIZATION + self.write("hash randomization: ") + hash_seed = os.getenv("PYTHONHASHSEED") or '0' + if HASH_RANDOMIZATION and (hash_seed == "random" or int(hash_seed)): + self.write("on (PYTHONHASHSEED=%s)\n" % hash_seed) + else: + self.write("off\n") + if self._split: + self.write("split: %s\n" % self._split) + self.write('\n') + self._t_start = clock() + + def finish(self): + self._t_end = clock() + self.write("\n") + global text, linelen + text = "tests finished: %d passed, " % self._passed + linelen = len(text) + + def add_text(mytext): + global text, linelen + """Break new text if too long.""" + if linelen + len(mytext) > self.terminal_width: + text += '\n' + linelen = 0 + text += mytext + linelen += len(mytext) + + if len(self._failed) > 0: + add_text("%d failed, " % len(self._failed)) + if len(self._failed_doctest) > 0: + add_text("%d failed, " % len(self._failed_doctest)) + if self._skipped > 0: + add_text("%d skipped, " % self._skipped) + if self._xfailed > 0: + add_text("%d expected to fail, " % self._xfailed) + if len(self._xpassed) > 0: + add_text("%d expected to fail but passed, " % len(self._xpassed)) + if len(self._exceptions) > 0: + add_text("%d exceptions, " % len(self._exceptions)) + add_text("in %.2f seconds" % (self._t_end - self._t_start)) + + if self.slow_test_functions: + self.write_center('slowest tests', '_') + sorted_slow = sorted(self.slow_test_functions, key=lambda r: r[1]) + for slow_func_name, taken in sorted_slow: + print('%s - Took %.3f seconds' % (slow_func_name, taken)) + + if self.fast_test_functions: + self.write_center('unexpectedly fast tests', '_') + sorted_fast = sorted(self.fast_test_functions, + key=lambda r: r[1]) + for fast_func_name, taken in sorted_fast: + print('%s - Took %.3f seconds' % (fast_func_name, taken)) + + if len(self._xpassed) > 0: + self.write_center("xpassed tests", "_") + for e in self._xpassed: + self.write("%s: %s\n" % (e[0], e[1])) + self.write("\n") + + if self._tb_style != "no" and len(self._exceptions) > 0: + for e in self._exceptions: + filename, f, (t, val, tb) = e + self.write_center("", "_") + if f is None: + s = "%s" % filename + else: + s = "%s:%s" % (filename, f.__name__) + self.write_center(s, "_") + self.write_exception(t, val, tb) + self.write("\n") + + if self._tb_style != "no" and len(self._failed) > 0: + for e in self._failed: + filename, f, (t, val, tb) = e + self.write_center("", "_") + self.write_center("%s::%s" % (filename, f.__name__), "_") + self.write_exception(t, val, tb) + self.write("\n") + + if self._tb_style != "no" and len(self._failed_doctest) > 0: + for e in self._failed_doctest: + filename, msg = e + self.write_center("", "_") + self.write_center("%s" % filename, "_") + self.write(msg) + self.write("\n") + + self.write_center(text) + ok = len(self._failed) == 0 and len(self._exceptions) == 0 and \ + len(self._failed_doctest) == 0 + if not ok: + self.write("DO *NOT* COMMIT!\n") + return ok + + def entering_filename(self, filename, n): + rel_name = filename[len(self._root_dir) + 1:] + self._active_file = rel_name + self._active_file_error = False + self.write(rel_name) + self.write("[%d] " % n) + + def leaving_filename(self): + self.write(" ") + if self._active_file_error: + self.write("[FAIL]", "Red", align="right") + else: + self.write("[OK]", "Green", align="right") + self.write("\n") + if self._verbose: + self.write("\n") + + def entering_test(self, f): + self._active_f = f + if self._verbose: + self.write("\n" + f.__name__ + " ") + + def test_xfail(self): + self._xfailed += 1 + self.write("f", "Green") + + def test_xpass(self, v): + message = str(v) + self._xpassed.append((self._active_file, message)) + self.write("X", "Green") + + def test_fail(self, exc_info): + self._failed.append((self._active_file, self._active_f, exc_info)) + self.write("F", "Red") + self._active_file_error = True + + def doctest_fail(self, name, error_msg): + # the first line contains "******", remove it: + error_msg = "\n".join(error_msg.split("\n")[1:]) + self._failed_doctest.append((name, error_msg)) + self.write("F", "Red") + self._active_file_error = True + + def test_pass(self, char="."): + self._passed += 1 + if self._verbose: + self.write("ok", "Green") + else: + self.write(char, "Green") + + def test_skip(self, v=None): + char = "s" + self._skipped += 1 + if v is not None: + message = str(v) + if message == "KeyboardInterrupt": + char = "K" + elif message == "Timeout": + char = "T" + elif message == "Slow": + char = "w" + if self._verbose: + if v is not None: + self.write(message + ' ', "Blue") + else: + self.write(" - ", "Blue") + self.write(char, "Blue") + + def test_exception(self, exc_info): + self._exceptions.append((self._active_file, self._active_f, exc_info)) + if exc_info[0] is TimeOutError: + self.write("T", "Red") + else: + self.write("E", "Red") + self._active_file_error = True + + def import_error(self, filename, exc_info): + self._exceptions.append((filename, None, exc_info)) + rel_name = filename[len(self._root_dir) + 1:] + self.write(rel_name) + self.write("[?] Failed to import", "Red") + self.write(" ") + self.write("[FAIL]", "Red", align="right") + self.write("\n") diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests_pytest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests_pytest.py new file mode 100644 index 0000000000000000000000000000000000000000..635f27864ca86571128e6c9a055199dfbde1ed63 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/runtests_pytest.py @@ -0,0 +1,461 @@ +"""Backwards compatible functions for running tests from SymPy using pytest. + +SymPy historically had its own testing framework that aimed to: +- be compatible with pytest; +- operate similarly (or identically) to pytest; +- not require any external dependencies; +- have all the functionality in one file only; +- have no magic, just import the test file and execute the test functions; and +- be portable. + +To reduce the maintenance burden of developing an independent testing framework +and to leverage the benefits of existing Python testing infrastructure, SymPy +now uses pytest (and various of its plugins) to run the test suite. + +To maintain backwards compatibility with the legacy testing interface of SymPy, +which implemented functions that allowed users to run the tests on their +installed version of SymPy, the functions in this module are implemented to +match the existing API while thinly wrapping pytest. + +These two key functions are `test` and `doctest`. + +""" + +import functools +import importlib.util +import os +import pathlib +import re +from fnmatch import fnmatch +from typing import List, Optional, Tuple + +try: + import pytest +except ImportError: + + class NoPytestError(Exception): + """Raise when an internal test helper function is called with pytest.""" + + class pytest: # type: ignore + """Shadow to support pytest features when pytest can't be imported.""" + + @staticmethod + def main(*args, **kwargs): + msg = 'pytest must be installed to run tests via this function' + raise NoPytestError(msg) + +from sympy.testing.runtests import test as test_sympy + + +TESTPATHS_DEFAULT = ( + pathlib.Path('sympy'), + pathlib.Path('doc', 'src'), +) +BLACKLIST_DEFAULT = ( + 'sympy/integrals/rubi/rubi_tests/tests', +) + + +class PytestPluginManager: + """Module names for pytest plugins used by SymPy.""" + PYTEST: str = 'pytest' + RANDOMLY: str = 'pytest_randomly' + SPLIT: str = 'pytest_split' + TIMEOUT: str = 'pytest_timeout' + XDIST: str = 'xdist' + + @functools.cached_property + def has_pytest(self) -> bool: + return bool(importlib.util.find_spec(self.PYTEST)) + + @functools.cached_property + def has_randomly(self) -> bool: + return bool(importlib.util.find_spec(self.RANDOMLY)) + + @functools.cached_property + def has_split(self) -> bool: + return bool(importlib.util.find_spec(self.SPLIT)) + + @functools.cached_property + def has_timeout(self) -> bool: + return bool(importlib.util.find_spec(self.TIMEOUT)) + + @functools.cached_property + def has_xdist(self) -> bool: + return bool(importlib.util.find_spec(self.XDIST)) + + +split_pattern = re.compile(r'([1-9][0-9]*)/([1-9][0-9]*)') + + +@functools.lru_cache +def sympy_dir() -> pathlib.Path: + """Returns the root SymPy directory.""" + return pathlib.Path(__file__).parents[2] + + +def update_args_with_paths( + paths: List[str], + keywords: Optional[Tuple[str]], + args: List[str], +) -> List[str]: + """Appends valid paths and flags to the args `list` passed to `pytest.main`. + + The are three different types of "path" that a user may pass to the `paths` + positional arguments, all of which need to be handled slightly differently: + + 1. Nothing is passed + The paths to the `testpaths` defined in `pytest.ini` need to be appended + to the arguments list. + 2. Full, valid paths are passed + These paths need to be validated but can then be directly appended to + the arguments list. + 3. Partial paths are passed. + The `testpaths` defined in `pytest.ini` need to be recursed and any + matches be appended to the arguments list. + + """ + + def find_paths_matching_partial(partial_paths): + partial_path_file_patterns = [] + for partial_path in partial_paths: + if len(partial_path) >= 4: + has_test_prefix = partial_path[:4] == 'test' + has_py_suffix = partial_path[-3:] == '.py' + elif len(partial_path) >= 3: + has_test_prefix = False + has_py_suffix = partial_path[-3:] == '.py' + else: + has_test_prefix = False + has_py_suffix = False + if has_test_prefix and has_py_suffix: + partial_path_file_patterns.append(partial_path) + elif has_test_prefix: + partial_path_file_patterns.append(f'{partial_path}*.py') + elif has_py_suffix: + partial_path_file_patterns.append(f'test*{partial_path}') + else: + partial_path_file_patterns.append(f'test*{partial_path}*.py') + matches = [] + for testpath in valid_testpaths_default: + for path, dirs, files in os.walk(testpath, topdown=True): + zipped = zip(partial_paths, partial_path_file_patterns) + for (partial_path, partial_path_file) in zipped: + if fnmatch(path, f'*{partial_path}*'): + matches.append(str(pathlib.Path(path))) + dirs[:] = [] + else: + for file in files: + if fnmatch(file, partial_path_file): + matches.append(str(pathlib.Path(path, file))) + return matches + + def is_tests_file(filepath: str) -> bool: + path = pathlib.Path(filepath) + if not path.is_file(): + return False + if not path.parts[-1].startswith('test_'): + return False + if not path.suffix == '.py': + return False + return True + + def find_tests_matching_keywords(keywords, filepath): + matches = [] + source = pathlib.Path(filepath).read_text(encoding='utf-8') + for line in source.splitlines(): + if line.lstrip().startswith('def '): + for kw in keywords: + if line.lower().find(kw.lower()) != -1: + test_name = line.split(' ')[1].split('(')[0] + full_test_path = filepath + '::' + test_name + matches.append(full_test_path) + return matches + + valid_testpaths_default = [] + for testpath in TESTPATHS_DEFAULT: + absolute_testpath = pathlib.Path(sympy_dir(), testpath) + if absolute_testpath.exists(): + valid_testpaths_default.append(str(absolute_testpath)) + + candidate_paths = [] + if paths: + full_paths = [] + partial_paths = [] + for path in paths: + if pathlib.Path(path).exists(): + full_paths.append(str(pathlib.Path(sympy_dir(), path))) + else: + partial_paths.append(path) + matched_paths = find_paths_matching_partial(partial_paths) + candidate_paths.extend(full_paths) + candidate_paths.extend(matched_paths) + else: + candidate_paths.extend(valid_testpaths_default) + + if keywords is not None and keywords != (): + matches = [] + for path in candidate_paths: + if is_tests_file(path): + test_matches = find_tests_matching_keywords(keywords, path) + matches.extend(test_matches) + else: + for root, dirnames, filenames in os.walk(path): + for filename in filenames: + absolute_filepath = str(pathlib.Path(root, filename)) + if is_tests_file(absolute_filepath): + test_matches = find_tests_matching_keywords( + keywords, + absolute_filepath, + ) + matches.extend(test_matches) + args.extend(matches) + else: + args.extend(candidate_paths) + + return args + + +def make_absolute_path(partial_path: str) -> str: + """Convert a partial path to an absolute path. + + A path such a `sympy/core` might be needed. However, absolute paths should + be used in the arguments to pytest in all cases as it avoids errors that + arise from nonexistent paths. + + This function assumes that partial_paths will be passed in such that they + begin with the explicit `sympy` directory, i.e. `sympy/...`. + + """ + + def is_valid_partial_path(partial_path: str) -> bool: + """Assumption that partial paths are defined from the `sympy` root.""" + return pathlib.Path(partial_path).parts[0] == 'sympy' + + if not is_valid_partial_path(partial_path): + msg = ( + f'Partial path {dir(partial_path)} is invalid, partial paths are ' + f'expected to be defined with the `sympy` directory as the root.' + ) + raise ValueError(msg) + + absolute_path = str(pathlib.Path(sympy_dir(), partial_path)) + return absolute_path + + +def test(*paths, subprocess=True, rerun=0, **kwargs): + """Interface to run tests via pytest compatible with SymPy's test runner. + + Explanation + =========== + + Note that a `pytest.ExitCode`, which is an `enum`, is returned. This is + different to the legacy SymPy test runner which would return a `bool`. If + all tests successfully pass the `pytest.ExitCode.OK` with value `0` is + returned, whereas the legacy SymPy test runner would return `True`. In any + other scenario, a non-zero `enum` value is returned, whereas the legacy + SymPy test runner would return `False`. Users need to, therefore, be careful + if treating the pytest exit codes as booleans because + `bool(pytest.ExitCode.OK)` evaluates to `False`, the opposite of legacy + behaviour. + + Examples + ======== + + >>> import sympy # doctest: +SKIP + + Run one file: + + >>> sympy.test('sympy/core/tests/test_basic.py') # doctest: +SKIP + >>> sympy.test('_basic') # doctest: +SKIP + + Run all tests in sympy/functions/ and some particular file: + + >>> sympy.test("sympy/core/tests/test_basic.py", + ... "sympy/functions") # doctest: +SKIP + + Run all tests in sympy/core and sympy/utilities: + + >>> sympy.test("/core", "/util") # doctest: +SKIP + + Run specific test from a file: + + >>> sympy.test("sympy/core/tests/test_basic.py", + ... kw="test_equality") # doctest: +SKIP + + Run specific test from any file: + + >>> sympy.test(kw="subs") # doctest: +SKIP + + Run the tests using the legacy SymPy runner: + + >>> sympy.test(use_sympy_runner=True) # doctest: +SKIP + + Note that this option is slated for deprecation in the near future and is + only currently provided to ensure users have an alternative option while the + pytest-based runner receives real-world testing. + + Parameters + ========== + paths : first n positional arguments of strings + Paths, both partial and absolute, describing which subset(s) of the test + suite are to be run. + subprocess : bool, default is True + Legacy option, is currently ignored. + rerun : int, default is 0 + Legacy option, is ignored. + use_sympy_runner : bool or None, default is None + Temporary option to invoke the legacy SymPy test runner instead of + `pytest.main`. Will be removed in the near future. + verbose : bool, default is False + Sets the verbosity of the pytest output. Using `True` will add the + `--verbose` option to the pytest call. + tb : str, 'auto', 'long', 'short', 'line', 'native', or 'no' + Sets the traceback print mode of pytest using the `--tb` option. + kw : str + Only run tests which match the given substring expression. An expression + is a Python evaluatable expression where all names are substring-matched + against test names and their parent classes. Example: -k 'test_method or + test_other' matches all test functions and classes whose name contains + 'test_method' or 'test_other', while -k 'not test_method' matches those + that don't contain 'test_method' in their names. -k 'not test_method and + not test_other' will eliminate the matches. Additionally keywords are + matched to classes and functions containing extra names in their + 'extra_keyword_matches' set, as well as functions which have names + assigned directly to them. The matching is case-insensitive. + pdb : bool, default is False + Start the interactive Python debugger on errors or `KeyboardInterrupt`. + colors : bool, default is True + Color terminal output. + force_colors : bool, default is False + Legacy option, is ignored. + sort : bool, default is True + Run the tests in sorted order. pytest uses a sorted test order by + default. Requires pytest-randomly. + seed : int + Seed to use for random number generation. Requires pytest-randomly. + timeout : int, default is 0 + Timeout in seconds before dumping the stacks. 0 means no timeout. + Requires pytest-timeout. + fail_on_timeout : bool, default is False + Legacy option, is currently ignored. + slow : bool, default is False + Run the subset of tests marked as `slow`. + enhance_asserts : bool, default is False + Legacy option, is currently ignored. + split : string in form `/` or None, default is None + Used to split the tests up. As an example, if `split='2/3' is used then + only the middle third of tests are run. Requires pytest-split. + time_balance : bool, default is True + Legacy option, is currently ignored. + blacklist : iterable of test paths as strings, default is BLACKLIST_DEFAULT + Blacklisted test paths are ignored using the `--ignore` option. Paths + may be partial or absolute. If partial then they are matched against + all paths in the pytest tests path. + parallel : bool, default is False + Parallelize the test running using pytest-xdist. If `True` then pytest + will automatically detect the number of CPU cores available and use them + all. Requires pytest-xdist. + store_durations : bool, False + Store test durations into the file `.test_durations`. The is used by + `pytest-split` to help determine more even splits when more than one + test group is being used. Requires pytest-split. + + """ + # NOTE: to be removed alongside SymPy test runner + if kwargs.get('use_sympy_runner', False): + kwargs.pop('parallel', False) + kwargs.pop('store_durations', False) + kwargs.pop('use_sympy_runner', True) + if kwargs.get('slow') is None: + kwargs['slow'] = False + return test_sympy(*paths, subprocess=True, rerun=0, **kwargs) + + pytest_plugin_manager = PytestPluginManager() + if not pytest_plugin_manager.has_pytest: + pytest.main() + + args = [] + + if kwargs.get('verbose', False): + args.append('--verbose') + + if tb := kwargs.get('tb'): + args.extend(['--tb', tb]) + + if kwargs.get('pdb'): + args.append('--pdb') + + if not kwargs.get('colors', True): + args.extend(['--color', 'no']) + + if seed := kwargs.get('seed'): + if not pytest_plugin_manager.has_randomly: + msg = '`pytest-randomly` plugin required to control random seed.' + raise ModuleNotFoundError(msg) + args.extend(['--randomly-seed', str(seed)]) + + if kwargs.get('sort', True) and pytest_plugin_manager.has_randomly: + args.append('--randomly-dont-reorganize') + elif not kwargs.get('sort', True) and not pytest_plugin_manager.has_randomly: + msg = '`pytest-randomly` plugin required to randomize test order.' + raise ModuleNotFoundError(msg) + + if timeout := kwargs.get('timeout', None): + if not pytest_plugin_manager.has_timeout: + msg = '`pytest-timeout` plugin required to apply timeout to tests.' + raise ModuleNotFoundError(msg) + args.extend(['--timeout', str(int(timeout))]) + + # Skip slow tests by default and always skip tooslow tests + if kwargs.get('slow', False): + args.extend(['-m', 'slow and not tooslow']) + else: + args.extend(['-m', 'not slow and not tooslow']) + + if (split := kwargs.get('split')) is not None: + if not pytest_plugin_manager.has_split: + msg = '`pytest-split` plugin required to run tests as groups.' + raise ModuleNotFoundError(msg) + match = split_pattern.match(split) + if not match: + msg = ('split must be a string of the form a/b where a and b are ' + 'positive nonzero ints') + raise ValueError(msg) + group, splits = map(str, match.groups()) + args.extend(['--group', group, '--splits', splits]) + if group > splits: + msg = (f'cannot have a group number {group} with only {splits} ' + 'splits') + raise ValueError(msg) + + if blacklist := kwargs.get('blacklist', BLACKLIST_DEFAULT): + for path in blacklist: + args.extend(['--ignore', make_absolute_path(path)]) + + if kwargs.get('parallel', False): + if not pytest_plugin_manager.has_xdist: + msg = '`pytest-xdist` plugin required to run tests in parallel.' + raise ModuleNotFoundError(msg) + args.extend(['-n', 'auto']) + + if kwargs.get('store_durations', False): + if not pytest_plugin_manager.has_split: + msg = '`pytest-split` plugin required to store test durations.' + raise ModuleNotFoundError(msg) + args.append('--store-durations') + + if (keywords := kwargs.get('kw')) is not None: + keywords = tuple(str(kw) for kw in keywords) + else: + keywords = () + + args = update_args_with_paths(paths, keywords, args) + exit_code = pytest.main(args) + return exit_code + + +def doctest(): + """Interface to run doctests via pytest compatible with SymPy's test runner. + """ + raise NotImplementedError diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/diagnose_imports.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/diagnose_imports.py new file mode 100644 index 0000000000000000000000000000000000000000..a31b66c66690c082800ae36eee37dad6927e0b37 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/diagnose_imports.py @@ -0,0 +1,216 @@ +#!/usr/bin/env python + +""" +Import diagnostics. Run bin/diagnose_imports.py --help for details. +""" + +from __future__ import annotations + +if __name__ == "__main__": + + import sys + import inspect + import builtins + + import optparse + + from os.path import abspath, dirname, join, normpath + this_file = abspath(__file__) + sympy_dir = join(dirname(this_file), '..', '..', '..') + sympy_dir = normpath(sympy_dir) + sys.path.insert(0, sympy_dir) + + option_parser = optparse.OptionParser( + usage= + "Usage: %prog option [options]\n" + "\n" + "Import analysis for imports between SymPy modules.") + option_group = optparse.OptionGroup( + option_parser, + 'Analysis options', + 'Options that define what to do. Exactly one of these must be given.') + option_group.add_option( + '--problems', + help= + 'Print all import problems, that is: ' + 'If an import pulls in a package instead of a module ' + '(e.g. sympy.core instead of sympy.core.add); ' # see ##PACKAGE## + 'if it imports a symbol that is already present; ' # see ##DUPLICATE## + 'if it imports a symbol ' + 'from somewhere other than the defining module.', # see ##ORIGIN## + action='count') + option_group.add_option( + '--origins', + help= + 'For each imported symbol in each module, ' + 'print the module that defined it. ' + '(This is useful for import refactoring.)', + action='count') + option_parser.add_option_group(option_group) + option_group = optparse.OptionGroup( + option_parser, + 'Sort options', + 'These options define the sort order for output lines. ' + 'At most one of these options is allowed. ' + 'Unsorted output will reflect the order in which imports happened.') + option_group.add_option( + '--by-importer', + help='Sort output lines by name of importing module.', + action='count') + option_group.add_option( + '--by-origin', + help='Sort output lines by name of imported module.', + action='count') + option_parser.add_option_group(option_group) + (options, args) = option_parser.parse_args() + if args: + option_parser.error( + 'Unexpected arguments %s (try %s --help)' % (args, sys.argv[0])) + if options.problems > 1: + option_parser.error('--problems must not be given more than once.') + if options.origins > 1: + option_parser.error('--origins must not be given more than once.') + if options.by_importer > 1: + option_parser.error('--by-importer must not be given more than once.') + if options.by_origin > 1: + option_parser.error('--by-origin must not be given more than once.') + options.problems = options.problems == 1 + options.origins = options.origins == 1 + options.by_importer = options.by_importer == 1 + options.by_origin = options.by_origin == 1 + if not options.problems and not options.origins: + option_parser.error( + 'At least one of --problems and --origins is required') + if options.problems and options.origins: + option_parser.error( + 'At most one of --problems and --origins is allowed') + if options.by_importer and options.by_origin: + option_parser.error( + 'At most one of --by-importer and --by-origin is allowed') + options.by_process = not options.by_importer and not options.by_origin + + builtin_import = builtins.__import__ + + class Definition: + """Information about a symbol's definition.""" + def __init__(self, name, value, definer): + self.name = name + self.value = value + self.definer = definer + def __hash__(self): + return hash(self.name) + def __eq__(self, other): + return self.name == other.name and self.value == other.value + def __ne__(self, other): + return not (self == other) + def __repr__(self): + return 'Definition(%s, ..., %s)' % ( + repr(self.name), repr(self.definer)) + + # Maps each function/variable to name of module to define it + symbol_definers: dict[Definition, str] = {} + + def in_module(a, b): + """Is a the same module as or a submodule of b?""" + return a == b or a != None and b != None and a.startswith(b + '.') + + def relevant(module): + """Is module relevant for import checking? + + Only imports between relevant modules will be checked.""" + return in_module(module, 'sympy') + + sorted_messages = [] + + def msg(msg, *args): + if options.by_process: + print(msg % args) + else: + sorted_messages.append(msg % args) + + def tracking_import(module, globals=globals(), locals=[], fromlist=None, level=-1): + """__import__ wrapper - does not change imports at all, but tracks them. + + Default order is implemented by doing output directly. + All other orders are implemented by collecting output information into + a sorted list that will be emitted after all imports are processed. + + Indirect imports can only occur after the requested symbol has been + imported directly (because the indirect import would not have a module + to pick the symbol up from). + So this code detects indirect imports by checking whether the symbol in + question was already imported. + + Keeps the semantics of __import__ unchanged.""" + caller_frame = inspect.getframeinfo(sys._getframe(1)) + importer_filename = caller_frame.filename + importer_module = globals['__name__'] + if importer_filename == caller_frame.filename: + importer_reference = '%s line %s' % ( + importer_filename, str(caller_frame.lineno)) + else: + importer_reference = importer_filename + result = builtin_import(module, globals, locals, fromlist, level) + importee_module = result.__name__ + # We're only interested if importer and importee are in SymPy + if relevant(importer_module) and relevant(importee_module): + for symbol in result.__dict__.iterkeys(): + definition = Definition( + symbol, result.__dict__[symbol], importer_module) + if definition not in symbol_definers: + symbol_definers[definition] = importee_module + if hasattr(result, '__path__'): + ##PACKAGE## + # The existence of __path__ is documented in the tutorial on modules. + # Python 3.3 documents this in http://docs.python.org/3.3/reference/import.html + if options.by_origin: + msg('Error: %s (a package) is imported by %s', + module, importer_reference) + else: + msg('Error: %s contains package import %s', + importer_reference, module) + if fromlist != None: + symbol_list = fromlist + if '*' in symbol_list: + if (importer_filename.endswith(("__init__.py", "__init__.pyc", "__init__.pyo"))): + # We do not check starred imports inside __init__ + # That's the normal "please copy over its imports to my namespace" + symbol_list = [] + else: + symbol_list = result.__dict__.iterkeys() + for symbol in symbol_list: + if symbol not in result.__dict__: + if options.by_origin: + msg('Error: %s.%s is not defined (yet), but %s tries to import it', + importee_module, symbol, importer_reference) + else: + msg('Error: %s tries to import %s.%s, which did not define it (yet)', + importer_reference, importee_module, symbol) + else: + definition = Definition( + symbol, result.__dict__[symbol], importer_module) + symbol_definer = symbol_definers[definition] + if symbol_definer == importee_module: + ##DUPLICATE## + if options.by_origin: + msg('Error: %s.%s is imported again into %s', + importee_module, symbol, importer_reference) + else: + msg('Error: %s imports %s.%s again', + importer_reference, importee_module, symbol) + else: + ##ORIGIN## + if options.by_origin: + msg('Error: %s.%s is imported by %s, which should import %s.%s instead', + importee_module, symbol, importer_reference, symbol_definer, symbol) + else: + msg('Error: %s imports %s.%s but should import %s.%s instead', + importer_reference, importee_module, symbol, symbol_definer, symbol) + return result + + builtins.__import__ = tracking_import + __import__('sympy') + + sorted_messages.sort() + for message in sorted_messages: + print(message) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_code_quality.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_code_quality.py new file mode 100644 index 0000000000000000000000000000000000000000..9a9f363f0b9a802553f8643186b7d858d1ad0694 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_code_quality.py @@ -0,0 +1,510 @@ +# coding=utf-8 +from os import walk, sep, pardir +from os.path import split, join, abspath, exists, isfile +from glob import glob +import re +import random +import ast + +from sympy.testing.pytest import raises +from sympy.testing.quality_unicode import _test_this_file_encoding + +# System path separator (usually slash or backslash) to be +# used with excluded files, e.g. +# exclude = set([ +# "%(sep)smpmath%(sep)s" % sepd, +# ]) +sepd = {"sep": sep} + +# path and sympy_path +SYMPY_PATH = abspath(join(split(__file__)[0], pardir, pardir)) # go to sympy/ +assert exists(SYMPY_PATH) + +TOP_PATH = abspath(join(SYMPY_PATH, pardir)) +BIN_PATH = join(TOP_PATH, "bin") +EXAMPLES_PATH = join(TOP_PATH, "examples") + +# Error messages +message_space = "File contains trailing whitespace: %s, line %s." +message_implicit = "File contains an implicit import: %s, line %s." +message_tabs = "File contains tabs instead of spaces: %s, line %s." +message_carriage = "File contains carriage returns at end of line: %s, line %s" +message_str_raise = "File contains string exception: %s, line %s" +message_gen_raise = "File contains generic exception: %s, line %s" +message_old_raise = "File contains old-style raise statement: %s, line %s, \"%s\"" +message_eof = "File does not end with a newline: %s, line %s" +message_multi_eof = "File ends with more than 1 newline: %s, line %s" +message_test_suite_def = "Function should start with 'test_' or '_': %s, line %s" +message_duplicate_test = "This is a duplicate test function: %s, line %s" +message_self_assignments = "File contains assignments to self/cls: %s, line %s." +message_func_is = "File contains '.func is': %s, line %s." +message_bare_expr = "File contains bare expression: %s, line %s." + +implicit_test_re = re.compile(r'^\s*(>>> )?(\.\.\. )?from .* import .*\*') +str_raise_re = re.compile( + r'^\s*(>>> )?(\.\.\. )?raise(\s+(\'|\")|\s*(\(\s*)+(\'|\"))') +gen_raise_re = re.compile( + r'^\s*(>>> )?(\.\.\. )?raise(\s+Exception|\s*(\(\s*)+Exception)') +old_raise_re = re.compile(r'^\s*(>>> )?(\.\.\. )?raise((\s*\(\s*)|\s+)\w+\s*,') +test_suite_def_re = re.compile(r'^def\s+(?!(_|test))[^(]*\(\s*\)\s*:$') +test_ok_def_re = re.compile(r'^def\s+test_.*:$') +test_file_re = re.compile(r'.*[/\\]test_.*\.py$') +func_is_re = re.compile(r'\.\s*func\s+is') + + +def tab_in_leading(s): + """Returns True if there are tabs in the leading whitespace of a line, + including the whitespace of docstring code samples.""" + n = len(s) - len(s.lstrip()) + if not s[n:n + 3] in ['...', '>>>']: + check = s[:n] + else: + smore = s[n + 3:] + check = s[:n] + smore[:len(smore) - len(smore.lstrip())] + return not (check.expandtabs() == check) + + +def find_self_assignments(s): + """Returns a list of "bad" assignments: if there are instances + of assigning to the first argument of the class method (except + for staticmethod's). + """ + t = [n for n in ast.parse(s).body if isinstance(n, ast.ClassDef)] + + bad = [] + for c in t: + for n in c.body: + if not isinstance(n, ast.FunctionDef): + continue + if any(d.id == 'staticmethod' + for d in n.decorator_list if isinstance(d, ast.Name)): + continue + if n.name == '__new__': + continue + if not n.args.args: + continue + first_arg = n.args.args[0].arg + + for m in ast.walk(n): + if isinstance(m, ast.Assign): + for a in m.targets: + if isinstance(a, ast.Name) and a.id == first_arg: + bad.append(m) + elif (isinstance(a, ast.Tuple) and + any(q.id == first_arg for q in a.elts + if isinstance(q, ast.Name))): + bad.append(m) + + return bad + + +def check_directory_tree(base_path, file_check, exclusions=set(), pattern="*.py"): + """ + Checks all files in the directory tree (with base_path as starting point) + with the file_check function provided, skipping files that contain + any of the strings in the set provided by exclusions. + """ + if not base_path: + return + for root, dirs, files in walk(base_path): + check_files(glob(join(root, pattern)), file_check, exclusions) + + +def check_files(files, file_check, exclusions=set(), pattern=None): + """ + Checks all files with the file_check function provided, skipping files + that contain any of the strings in the set provided by exclusions. + """ + if not files: + return + for fname in files: + if not exists(fname) or not isfile(fname): + continue + if any(ex in fname for ex in exclusions): + continue + if pattern is None or re.match(pattern, fname): + file_check(fname) + + +class _Visit(ast.NodeVisitor): + """return the line number corresponding to the + line on which a bare expression appears if it is a binary op + or a comparison that is not in a with block. + + EXAMPLES + ======== + + >>> import ast + >>> class _Visit(ast.NodeVisitor): + ... def visit_Expr(self, node): + ... if isinstance(node.value, (ast.BinOp, ast.Compare)): + ... print(node.lineno) + ... def visit_With(self, node): + ... pass # no checking there + ... + >>> code='''x = 1 # line 1 + ... for i in range(3): + ... x == 2 # <-- 3 + ... if x == 2: + ... x == 3 # <-- 5 + ... x + 1 # <-- 6 + ... x = 1 + ... if x == 1: + ... print(1) + ... while x != 1: + ... x == 1 # <-- 11 + ... with raises(TypeError): + ... c == 1 + ... raise TypeError + ... assert x == 1 + ... ''' + >>> _Visit().visit(ast.parse(code)) + 3 + 5 + 6 + 11 + """ + def visit_Expr(self, node): + if isinstance(node.value, (ast.BinOp, ast.Compare)): + assert None, message_bare_expr % ('', node.lineno) + def visit_With(self, node): + pass + + +BareExpr = _Visit() + + +def line_with_bare_expr(code): + """return None or else 0-based line number of code on which + a bare expression appeared. + """ + tree = ast.parse(code) + try: + BareExpr.visit(tree) + except AssertionError as msg: + assert msg.args + msg = msg.args[0] + assert msg.startswith(message_bare_expr.split(':', 1)[0]) + return int(msg.rsplit(' ', 1)[1].rstrip('.')) # the line number + + +def test_files(): + """ + This test tests all files in SymPy and checks that: + o no lines contains a trailing whitespace + o no lines end with \r\n + o no line uses tabs instead of spaces + o that the file ends with a single newline + o there are no general or string exceptions + o there are no old style raise statements + o name of arg-less test suite functions start with _ or test_ + o no duplicate function names that start with test_ + o no assignments to self variable in class methods + o no lines contain ".func is" except in the test suite + o there is no do-nothing expression like `a == b` or `x + 1` + """ + + def test(fname): + with open(fname, encoding="utf8") as test_file: + test_this_file(fname, test_file) + with open(fname, encoding='utf8') as test_file: + _test_this_file_encoding(fname, test_file) + + def test_this_file(fname, test_file): + idx = None + code = test_file.read() + test_file.seek(0) # restore reader to head + py = fname if sep not in fname else fname.rsplit(sep, 1)[-1] + if py.startswith('test_'): + idx = line_with_bare_expr(code) + if idx is not None: + assert False, message_bare_expr % (fname, idx + 1) + + line = None # to flag the case where there were no lines in file + tests = 0 + test_set = set() + for idx, line in enumerate(test_file): + if test_file_re.match(fname): + if test_suite_def_re.match(line): + assert False, message_test_suite_def % (fname, idx + 1) + if test_ok_def_re.match(line): + tests += 1 + test_set.add(line[3:].split('(')[0].strip()) + if len(test_set) != tests: + assert False, message_duplicate_test % (fname, idx + 1) + if line.endswith((" \n", "\t\n")): + assert False, message_space % (fname, idx + 1) + if line.endswith("\r\n"): + assert False, message_carriage % (fname, idx + 1) + if tab_in_leading(line): + assert False, message_tabs % (fname, idx + 1) + if str_raise_re.search(line): + assert False, message_str_raise % (fname, idx + 1) + if gen_raise_re.search(line): + assert False, message_gen_raise % (fname, idx + 1) + if (implicit_test_re.search(line) and + not list(filter(lambda ex: ex in fname, import_exclude))): + assert False, message_implicit % (fname, idx + 1) + if func_is_re.search(line) and not test_file_re.search(fname): + assert False, message_func_is % (fname, idx + 1) + + result = old_raise_re.search(line) + + if result is not None: + assert False, message_old_raise % ( + fname, idx + 1, result.group(2)) + + if line is not None: + if line == '\n' and idx > 0: + assert False, message_multi_eof % (fname, idx + 1) + elif not line.endswith('\n'): + # eof newline check + assert False, message_eof % (fname, idx + 1) + + + # Files to test at top level + top_level_files = [join(TOP_PATH, file) for file in [ + "isympy.py", + "build.py", + "setup.py", + ]] + # Files to exclude from all tests + exclude = { + "%(sep)ssympy%(sep)sparsing%(sep)sautolev%(sep)s_antlr%(sep)sautolevparser.py" % sepd, + "%(sep)ssympy%(sep)sparsing%(sep)sautolev%(sep)s_antlr%(sep)sautolevlexer.py" % sepd, + "%(sep)ssympy%(sep)sparsing%(sep)sautolev%(sep)s_antlr%(sep)sautolevlistener.py" % sepd, + "%(sep)ssympy%(sep)sparsing%(sep)slatex%(sep)s_antlr%(sep)slatexparser.py" % sepd, + "%(sep)ssympy%(sep)sparsing%(sep)slatex%(sep)s_antlr%(sep)slatexlexer.py" % sepd, + } + # Files to exclude from the implicit import test + import_exclude = { + # glob imports are allowed in top-level __init__.py: + "%(sep)ssympy%(sep)s__init__.py" % sepd, + # these __init__.py should be fixed: + # XXX: not really, they use useful import pattern (DRY) + "%(sep)svector%(sep)s__init__.py" % sepd, + "%(sep)smechanics%(sep)s__init__.py" % sepd, + "%(sep)squantum%(sep)s__init__.py" % sepd, + "%(sep)spolys%(sep)s__init__.py" % sepd, + "%(sep)spolys%(sep)sdomains%(sep)s__init__.py" % sepd, + # interactive SymPy executes ``from sympy import *``: + "%(sep)sinteractive%(sep)ssession.py" % sepd, + # isympy.py executes ``from sympy import *``: + "%(sep)sisympy.py" % sepd, + # these two are import timing tests: + "%(sep)sbin%(sep)ssympy_time.py" % sepd, + "%(sep)sbin%(sep)ssympy_time_cache.py" % sepd, + # Taken from Python stdlib: + "%(sep)sparsing%(sep)ssympy_tokenize.py" % sepd, + # this one should be fixed: + "%(sep)splotting%(sep)spygletplot%(sep)s" % sepd, + # False positive in the docstring + "%(sep)sbin%(sep)stest_external_imports.py" % sepd, + "%(sep)sbin%(sep)stest_submodule_imports.py" % sepd, + # These are deprecated stubs that can be removed at some point: + "%(sep)sutilities%(sep)sruntests.py" % sepd, + "%(sep)sutilities%(sep)spytest.py" % sepd, + "%(sep)sutilities%(sep)srandtest.py" % sepd, + "%(sep)sutilities%(sep)stmpfiles.py" % sepd, + "%(sep)sutilities%(sep)squality_unicode.py" % sepd, + } + check_files(top_level_files, test) + check_directory_tree(BIN_PATH, test, {"~", ".pyc", ".sh"}, "*") + check_directory_tree(SYMPY_PATH, test, exclude) + check_directory_tree(EXAMPLES_PATH, test, exclude) + + +def _with_space(c): + # return c with a random amount of leading space + return random.randint(0, 10)*' ' + c + + +def test_raise_statement_regular_expression(): + candidates_ok = [ + "some text # raise Exception, 'text'", + "raise ValueError('text') # raise Exception, 'text'", + "raise ValueError('text')", + "raise ValueError", + "raise ValueError('text')", + "raise ValueError('text') #,", + # Talking about an exception in a docstring + ''''"""This function will raise ValueError, except when it doesn't"""''', + "raise (ValueError('text')", + ] + str_candidates_fail = [ + "raise 'exception'", + "raise 'Exception'", + 'raise "exception"', + 'raise "Exception"', + "raise 'ValueError'", + ] + gen_candidates_fail = [ + "raise Exception('text') # raise Exception, 'text'", + "raise Exception('text')", + "raise Exception", + "raise Exception('text')", + "raise Exception('text') #,", + "raise Exception, 'text'", + "raise Exception, 'text' # raise Exception('text')", + "raise Exception, 'text' # raise Exception, 'text'", + ">>> raise Exception, 'text'", + ">>> raise Exception, 'text' # raise Exception('text')", + ">>> raise Exception, 'text' # raise Exception, 'text'", + ] + old_candidates_fail = [ + "raise Exception, 'text'", + "raise Exception, 'text' # raise Exception('text')", + "raise Exception, 'text' # raise Exception, 'text'", + ">>> raise Exception, 'text'", + ">>> raise Exception, 'text' # raise Exception('text')", + ">>> raise Exception, 'text' # raise Exception, 'text'", + "raise ValueError, 'text'", + "raise ValueError, 'text' # raise Exception('text')", + "raise ValueError, 'text' # raise Exception, 'text'", + ">>> raise ValueError, 'text'", + ">>> raise ValueError, 'text' # raise Exception('text')", + ">>> raise ValueError, 'text' # raise Exception, 'text'", + "raise(ValueError,", + "raise (ValueError,", + "raise( ValueError,", + "raise ( ValueError,", + "raise(ValueError ,", + "raise (ValueError ,", + "raise( ValueError ,", + "raise ( ValueError ,", + ] + + for c in candidates_ok: + assert str_raise_re.search(_with_space(c)) is None, c + assert gen_raise_re.search(_with_space(c)) is None, c + assert old_raise_re.search(_with_space(c)) is None, c + for c in str_candidates_fail: + assert str_raise_re.search(_with_space(c)) is not None, c + for c in gen_candidates_fail: + assert gen_raise_re.search(_with_space(c)) is not None, c + for c in old_candidates_fail: + assert old_raise_re.search(_with_space(c)) is not None, c + + +def test_implicit_imports_regular_expression(): + candidates_ok = [ + "from sympy import something", + ">>> from sympy import something", + "from sympy.somewhere import something", + ">>> from sympy.somewhere import something", + "import sympy", + ">>> import sympy", + "import sympy.something.something", + "... import sympy", + "... import sympy.something.something", + "... from sympy import something", + "... from sympy.somewhere import something", + ">> from sympy import *", # To allow 'fake' docstrings + "# from sympy import *", + "some text # from sympy import *", + ] + candidates_fail = [ + "from sympy import *", + ">>> from sympy import *", + "from sympy.somewhere import *", + ">>> from sympy.somewhere import *", + "... from sympy import *", + "... from sympy.somewhere import *", + ] + for c in candidates_ok: + assert implicit_test_re.search(_with_space(c)) is None, c + for c in candidates_fail: + assert implicit_test_re.search(_with_space(c)) is not None, c + + +def test_test_suite_defs(): + candidates_ok = [ + " def foo():\n", + "def foo(arg):\n", + "def _foo():\n", + "def test_foo():\n", + ] + candidates_fail = [ + "def foo():\n", + "def foo() :\n", + "def foo( ):\n", + "def foo():\n", + ] + for c in candidates_ok: + assert test_suite_def_re.search(c) is None, c + for c in candidates_fail: + assert test_suite_def_re.search(c) is not None, c + + +def test_test_duplicate_defs(): + candidates_ok = [ + "def foo():\ndef foo():\n", + "def test():\ndef test_():\n", + "def test_():\ndef test__():\n", + ] + candidates_fail = [ + "def test_():\ndef test_ ():\n", + "def test_1():\ndef test_1():\n", + ] + ok = (None, 'check') + def check(file): + tests = 0 + test_set = set() + for idx, line in enumerate(file.splitlines()): + if test_ok_def_re.match(line): + tests += 1 + test_set.add(line[3:].split('(')[0].strip()) + if len(test_set) != tests: + return False, message_duplicate_test % ('check', idx + 1) + return None, 'check' + for c in candidates_ok: + assert check(c) == ok + for c in candidates_fail: + assert check(c) != ok + + +def test_find_self_assignments(): + candidates_ok = [ + "class A(object):\n def foo(self, arg): arg = self\n", + "class A(object):\n def foo(self, arg): self.prop = arg\n", + "class A(object):\n def foo(self, arg): obj, obj2 = arg, self\n", + "class A(object):\n @classmethod\n def bar(cls, arg): arg = cls\n", + "class A(object):\n def foo(var, arg): arg = var\n", + ] + candidates_fail = [ + "class A(object):\n def foo(self, arg): self = arg\n", + "class A(object):\n def foo(self, arg): obj, self = arg, arg\n", + "class A(object):\n def foo(self, arg):\n if arg: self = arg", + "class A(object):\n @classmethod\n def foo(cls, arg): cls = arg\n", + "class A(object):\n def foo(var, arg): var = arg\n", + ] + + for c in candidates_ok: + assert find_self_assignments(c) == [] + for c in candidates_fail: + assert find_self_assignments(c) != [] + + +def test_test_unicode_encoding(): + unicode_whitelist = ['foo'] + unicode_strict_whitelist = ['bar'] + + fname = 'abc' + test_file = ['α'] + raises(AssertionError, lambda: _test_this_file_encoding( + fname, test_file, unicode_whitelist, unicode_strict_whitelist)) + + fname = 'abc' + test_file = ['abc'] + _test_this_file_encoding( + fname, test_file, unicode_whitelist, unicode_strict_whitelist) + + fname = 'foo' + test_file = ['abc'] + raises(AssertionError, lambda: _test_this_file_encoding( + fname, test_file, unicode_whitelist, unicode_strict_whitelist)) + + fname = 'bar' + test_file = ['abc'] + _test_this_file_encoding( + fname, test_file, unicode_whitelist, unicode_strict_whitelist) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_deprecated.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_deprecated.py new file mode 100644 index 0000000000000000000000000000000000000000..696933d96d6232ea869da1002ec9ebee5309724d --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_deprecated.py @@ -0,0 +1,5 @@ +from sympy.testing.pytest import warns_deprecated_sympy + +def test_deprecated_testing_randtest(): + with warns_deprecated_sympy(): + import sympy.testing.randtest # noqa:F401 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_module_imports.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_module_imports.py new file mode 100644 index 0000000000000000000000000000000000000000..d16dbaa98156c287c18b46ff07c0ede5d26e069a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_module_imports.py @@ -0,0 +1,42 @@ +""" +Checks that SymPy does not contain indirect imports. + +An indirect import is importing a symbol from a module that itself imported the +symbol from elsewhere. Such a constellation makes it harder to diagnose +inter-module dependencies and import order problems, and is therefore strongly +discouraged. + +(Indirect imports from end-user code is fine and in fact a best practice.) + +Implementation note: Forcing Python into actually unloading already-imported +submodules is a tricky and partly undocumented process. To avoid these issues, +the actual diagnostic code is in bin/diagnose_imports, which is run as a +separate, pristine Python process. +""" + +import subprocess +import sys +from os.path import abspath, dirname, join, normpath +import inspect + +from sympy.testing.pytest import XFAIL + +@XFAIL +def test_module_imports_are_direct(): + my_filename = abspath(inspect.getfile(inspect.currentframe())) + my_dirname = dirname(my_filename) + diagnose_imports_filename = join(my_dirname, 'diagnose_imports.py') + diagnose_imports_filename = normpath(diagnose_imports_filename) + + process = subprocess.Popen( + [ + sys.executable, + normpath(diagnose_imports_filename), + '--problems', + '--by-importer' + ], + stdout=subprocess.PIPE, + stderr=subprocess.STDOUT, + bufsize=-1) + output, _ = process.communicate() + assert output == '', "There are import problems:\n" + output.decode() diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_pytest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_pytest.py new file mode 100644 index 0000000000000000000000000000000000000000..7080a4ed4602707a3efb4d9025e8e9cbe23a5ef8 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_pytest.py @@ -0,0 +1,211 @@ +import warnings + +from sympy.testing.pytest import (raises, warns, ignore_warnings, + warns_deprecated_sympy, Failed) +from sympy.utilities.exceptions import sympy_deprecation_warning + + + +# Test callables + + +def test_expected_exception_is_silent_callable(): + def f(): + raise ValueError() + raises(ValueError, f) + + +# Under pytest raises will raise Failed rather than AssertionError +def test_lack_of_exception_triggers_AssertionError_callable(): + try: + raises(Exception, lambda: 1 + 1) + assert False + except Failed as e: + assert "DID NOT RAISE" in str(e) + + +def test_unexpected_exception_is_passed_through_callable(): + def f(): + raise ValueError("some error message") + try: + raises(TypeError, f) + assert False + except ValueError as e: + assert str(e) == "some error message" + +# Test with statement + +def test_expected_exception_is_silent_with(): + with raises(ValueError): + raise ValueError() + + +def test_lack_of_exception_triggers_AssertionError_with(): + try: + with raises(Exception): + 1 + 1 + assert False + except Failed as e: + assert "DID NOT RAISE" in str(e) + + +def test_unexpected_exception_is_passed_through_with(): + try: + with raises(TypeError): + raise ValueError("some error message") + assert False + except ValueError as e: + assert str(e) == "some error message" + +# Now we can use raises() instead of try/catch +# to test that a specific exception class is raised + + +def test_second_argument_should_be_callable_or_string(): + raises(TypeError, lambda: raises("irrelevant", 42)) + + +def test_warns_catches_warning(): + with warnings.catch_warnings(record=True) as w: + with warns(UserWarning): + warnings.warn('this is the warning message') + assert len(w) == 0 + + +def test_warns_raises_without_warning(): + with raises(Failed): + with warns(UserWarning): + pass + + +def test_warns_hides_other_warnings(): + with raises(RuntimeWarning): + with warns(UserWarning): + warnings.warn('this is the warning message', UserWarning) + warnings.warn('this is the other message', RuntimeWarning) + + +def test_warns_continues_after_warning(): + with warnings.catch_warnings(record=True) as w: + finished = False + with warns(UserWarning): + warnings.warn('this is the warning message') + finished = True + assert finished + assert len(w) == 0 + + +def test_warns_many_warnings(): + with warns(UserWarning): + warnings.warn('this is the warning message', UserWarning) + warnings.warn('this is the other warning message', UserWarning) + + +def test_warns_match_matching(): + with warnings.catch_warnings(record=True) as w: + with warns(UserWarning, match='this is the warning message'): + warnings.warn('this is the warning message', UserWarning) + assert len(w) == 0 + + +def test_warns_match_non_matching(): + with warnings.catch_warnings(record=True) as w: + with raises(Failed): + with warns(UserWarning, match='this is the warning message'): + warnings.warn('this is not the expected warning message', UserWarning) + assert len(w) == 0 + +def _warn_sympy_deprecation(stacklevel=3): + sympy_deprecation_warning( + "feature", + active_deprecations_target="active-deprecations", + deprecated_since_version="0.0.0", + stacklevel=stacklevel, + ) + +def test_warns_deprecated_sympy_catches_warning(): + with warnings.catch_warnings(record=True) as w: + with warns_deprecated_sympy(): + _warn_sympy_deprecation() + assert len(w) == 0 + + +def test_warns_deprecated_sympy_raises_without_warning(): + with raises(Failed): + with warns_deprecated_sympy(): + pass + +def test_warns_deprecated_sympy_wrong_stacklevel(): + with raises(Failed): + with warns_deprecated_sympy(): + _warn_sympy_deprecation(stacklevel=1) + +def test_warns_deprecated_sympy_doesnt_hide_other_warnings(): + # Unlike pytest's deprecated_call, we should not hide other warnings. + with raises(RuntimeWarning): + with warns_deprecated_sympy(): + _warn_sympy_deprecation() + warnings.warn('this is the other message', RuntimeWarning) + + +def test_warns_deprecated_sympy_continues_after_warning(): + with warnings.catch_warnings(record=True) as w: + finished = False + with warns_deprecated_sympy(): + _warn_sympy_deprecation() + finished = True + assert finished + assert len(w) == 0 + +def test_ignore_ignores_warning(): + with warnings.catch_warnings(record=True) as w: + with ignore_warnings(UserWarning): + warnings.warn('this is the warning message') + assert len(w) == 0 + + +def test_ignore_does_not_raise_without_warning(): + with warnings.catch_warnings(record=True) as w: + with ignore_warnings(UserWarning): + pass + assert len(w) == 0 + + +def test_ignore_allows_other_warnings(): + with warnings.catch_warnings(record=True) as w: + # This is needed when pytest is run as -Werror + # the setting is reverted at the end of the catch_Warnings block. + warnings.simplefilter("always") + with ignore_warnings(UserWarning): + warnings.warn('this is the warning message', UserWarning) + warnings.warn('this is the other message', RuntimeWarning) + assert len(w) == 1 + assert isinstance(w[0].message, RuntimeWarning) + assert str(w[0].message) == 'this is the other message' + + +def test_ignore_continues_after_warning(): + with warnings.catch_warnings(record=True) as w: + finished = False + with ignore_warnings(UserWarning): + warnings.warn('this is the warning message') + finished = True + assert finished + assert len(w) == 0 + + +def test_ignore_many_warnings(): + with warnings.catch_warnings(record=True) as w: + # This is needed when pytest is run as -Werror + # the setting is reverted at the end of the catch_Warnings block. + warnings.simplefilter("always") + with ignore_warnings(UserWarning): + warnings.warn('this is the warning message', UserWarning) + warnings.warn('this is the other message', RuntimeWarning) + warnings.warn('this is the warning message', UserWarning) + warnings.warn('this is the other message', RuntimeWarning) + warnings.warn('this is the other message', RuntimeWarning) + assert len(w) == 3 + for wi in w: + assert isinstance(wi.message, RuntimeWarning) + assert str(wi.message) == 'this is the other message' diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_runtests_pytest.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_runtests_pytest.py new file mode 100644 index 0000000000000000000000000000000000000000..cd56d831f3618c9dbb8a1dffe63d95a0befc6adf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tests/test_runtests_pytest.py @@ -0,0 +1,171 @@ +import pathlib +from typing import List + +import pytest + +from sympy.testing.runtests_pytest import ( + make_absolute_path, + sympy_dir, + update_args_with_paths, +) + + +class TestMakeAbsolutePath: + + @staticmethod + @pytest.mark.parametrize( + 'partial_path', ['sympy', 'sympy/core', 'sympy/nonexistant_directory'], + ) + def test_valid_partial_path(partial_path: str): + """Paths that start with `sympy` are valid.""" + _ = make_absolute_path(partial_path) + + @staticmethod + @pytest.mark.parametrize( + 'partial_path', ['not_sympy', 'also/not/sympy'], + ) + def test_invalid_partial_path_raises_value_error(partial_path: str): + """A `ValueError` is raises on paths that don't start with `sympy`.""" + with pytest.raises(ValueError): + _ = make_absolute_path(partial_path) + + +class TestUpdateArgsWithPaths: + + @staticmethod + def test_no_paths(): + """If no paths are passed, only `sympy` and `doc/src` are appended. + + `sympy` and `doc/src` are the `testpaths` stated in `pytest.ini`. They + need to be manually added as if any path-related arguments are passed + to `pytest.main` then the settings in `pytest.ini` may be ignored. + + """ + paths = [] + args = update_args_with_paths(paths=paths, keywords=None, args=[]) + expected = [ + str(pathlib.Path(sympy_dir(), 'sympy')), + str(pathlib.Path(sympy_dir(), 'doc/src')), + ] + assert args == expected + + @staticmethod + @pytest.mark.parametrize( + 'path', + ['sympy/core/tests/test_basic.py', '_basic'] + ) + def test_one_file(path: str): + """Single files/paths, full or partial, are matched correctly.""" + args = update_args_with_paths(paths=[path], keywords=None, args=[]) + expected = [ + str(pathlib.Path(sympy_dir(), 'sympy/core/tests/test_basic.py')), + ] + assert args == expected + + @staticmethod + def test_partial_path_from_root(): + """Partial paths from the root directly are matched correctly.""" + args = update_args_with_paths(paths=['sympy/functions'], keywords=None, args=[]) + expected = [str(pathlib.Path(sympy_dir(), 'sympy/functions'))] + assert args == expected + + @staticmethod + def test_multiple_paths_from_root(): + """Multiple paths, partial or full, are matched correctly.""" + paths = ['sympy/core/tests/test_basic.py', 'sympy/functions'] + args = update_args_with_paths(paths=paths, keywords=None, args=[]) + expected = [ + str(pathlib.Path(sympy_dir(), 'sympy/core/tests/test_basic.py')), + str(pathlib.Path(sympy_dir(), 'sympy/functions')), + ] + assert args == expected + + @staticmethod + @pytest.mark.parametrize( + 'paths, expected_paths', + [ + ( + ['/core', '/util'], + [ + 'doc/src/modules/utilities', + 'doc/src/reference/public/utilities', + 'sympy/core', + 'sympy/logic/utilities', + 'sympy/utilities', + ] + ), + ] + ) + def test_multiple_paths_from_non_root(paths: List[str], expected_paths: List[str]): + """Multiple partial paths are matched correctly.""" + args = update_args_with_paths(paths=paths, keywords=None, args=[]) + assert len(args) == len(expected_paths) + for arg, expected in zip(sorted(args), expected_paths): + assert expected in arg + + @staticmethod + @pytest.mark.parametrize( + 'paths', + [ + + [], + ['sympy/physics'], + ['sympy/physics/mechanics'], + ['sympy/physics/mechanics/tests'], + ['sympy/physics/mechanics/tests/test_kane3.py'], + ] + ) + def test_string_as_keyword(paths: List[str]): + """String keywords are matched correctly.""" + keywords = ('bicycle', ) + args = update_args_with_paths(paths=paths, keywords=keywords, args=[]) + expected_args = ['sympy/physics/mechanics/tests/test_kane3.py::test_bicycle'] + assert len(args) == len(expected_args) + for arg, expected in zip(sorted(args), expected_args): + assert expected in arg + + @staticmethod + @pytest.mark.parametrize( + 'paths', + [ + + [], + ['sympy/core'], + ['sympy/core/tests'], + ['sympy/core/tests/test_sympify.py'], + ] + ) + def test_integer_as_keyword(paths: List[str]): + """Integer keywords are matched correctly.""" + keywords = ('3538', ) + args = update_args_with_paths(paths=paths, keywords=keywords, args=[]) + expected_args = ['sympy/core/tests/test_sympify.py::test_issue_3538'] + assert len(args) == len(expected_args) + for arg, expected in zip(sorted(args), expected_args): + assert expected in arg + + @staticmethod + def test_multiple_keywords(): + """Multiple keywords are matched correctly.""" + keywords = ('bicycle', '3538') + args = update_args_with_paths(paths=[], keywords=keywords, args=[]) + expected_args = [ + 'sympy/core/tests/test_sympify.py::test_issue_3538', + 'sympy/physics/mechanics/tests/test_kane3.py::test_bicycle', + ] + assert len(args) == len(expected_args) + for arg, expected in zip(sorted(args), expected_args): + assert expected in arg + + @staticmethod + def test_keyword_match_in_multiple_files(): + """Keywords are matched across multiple files.""" + keywords = ('1130', ) + args = update_args_with_paths(paths=[], keywords=keywords, args=[]) + expected_args = [ + 'sympy/integrals/tests/test_heurisch.py::test_heurisch_symbolic_coeffs_1130', + 'sympy/utilities/tests/test_lambdify.py::test_python_div_zero_issue_11306', + ] + assert len(args) == len(expected_args) + for arg, expected in zip(sorted(args), expected_args): + assert expected in arg diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tmpfiles.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tmpfiles.py new file mode 100644 index 0000000000000000000000000000000000000000..1d5c69cb58aa11f77679855f3df21f03a10d3b2b --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/testing/tmpfiles.py @@ -0,0 +1,46 @@ +""" +This module adds context manager for temporary files generated by the tests. +""" + +import shutil +import os + + +class TmpFileManager: + """ + A class to track record of every temporary files created by the tests. + """ + tmp_files = set('') + tmp_folders = set('') + + @classmethod + def tmp_file(cls, name=''): + cls.tmp_files.add(name) + return name + + @classmethod + def tmp_folder(cls, name=''): + cls.tmp_folders.add(name) + return name + + @classmethod + def cleanup(cls): + while cls.tmp_files: + file = cls.tmp_files.pop() + if os.path.isfile(file): + os.remove(file) + while cls.tmp_folders: + folder = cls.tmp_folders.pop() + shutil.rmtree(folder) + +def cleanup_tmp_files(test_func): + """ + A decorator to help test codes remove temporary files after the tests. + """ + def wrapper_function(): + try: + test_func() + finally: + TmpFileManager.cleanup() + + return wrapper_function diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..5c166f9163785f4aa5744324eb817bef79b33525 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/__init__.py @@ -0,0 +1,15 @@ +""" Unification in SymPy + +See sympy.unify.core docstring for algorithmic details + +See http://matthewrocklin.com/blog/work/2012/11/01/Unification/ for discussion +""" + +from .usympy import unify, rebuild +from .rewrite import rewriterule + +__all__ = [ + 'unify', 'rebuild', + + 'rewriterule', +] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/core.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/core.py new file mode 100644 index 0000000000000000000000000000000000000000..5359d0bbd376e9fa9efacff1d90c0bf51414cebf --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/core.py @@ -0,0 +1,234 @@ +""" Generic Unification algorithm for expression trees with lists of children + +This implementation is a direct translation of + +Artificial Intelligence: A Modern Approach by Stuart Russel and Peter Norvig +Second edition, section 9.2, page 276 + +It is modified in the following ways: + +1. We allow associative and commutative Compound expressions. This results in + combinatorial blowup. +2. We explore the tree lazily. +3. We provide generic interfaces to symbolic algebra libraries in Python. + +A more traditional version can be found here +http://aima.cs.berkeley.edu/python/logic.html +""" + +from sympy.utilities.iterables import kbins + +class Compound: + """ A little class to represent an interior node in the tree + + This is analogous to SymPy.Basic for non-Atoms + """ + def __init__(self, op, args): + self.op = op + self.args = args + + def __eq__(self, other): + return (type(self) is type(other) and self.op == other.op and + self.args == other.args) + + def __hash__(self): + return hash((type(self), self.op, self.args)) + + def __str__(self): + return "%s[%s]" % (str(self.op), ', '.join(map(str, self.args))) + +class Variable: + """ A Wild token """ + def __init__(self, arg): + self.arg = arg + + def __eq__(self, other): + return type(self) is type(other) and self.arg == other.arg + + def __hash__(self): + return hash((type(self), self.arg)) + + def __str__(self): + return "Variable(%s)" % str(self.arg) + +class CondVariable: + """ A wild token that matches conditionally. + + arg - a wild token. + valid - an additional constraining function on a match. + """ + def __init__(self, arg, valid): + self.arg = arg + self.valid = valid + + def __eq__(self, other): + return (type(self) is type(other) and + self.arg == other.arg and + self.valid == other.valid) + + def __hash__(self): + return hash((type(self), self.arg, self.valid)) + + def __str__(self): + return "CondVariable(%s)" % str(self.arg) + +def unify(x, y, s=None, **fns): + """ Unify two expressions. + + Parameters + ========== + + x, y - expression trees containing leaves, Compounds and Variables. + s - a mapping of variables to subtrees. + + Returns + ======= + + lazy sequence of mappings {Variable: subtree} + + Examples + ======== + + >>> from sympy.unify.core import unify, Compound, Variable + >>> expr = Compound("Add", ("x", "y")) + >>> pattern = Compound("Add", ("x", Variable("a"))) + >>> next(unify(expr, pattern, {})) + {Variable(a): 'y'} + """ + s = s or {} + + if x == y: + yield s + elif isinstance(x, (Variable, CondVariable)): + yield from unify_var(x, y, s, **fns) + elif isinstance(y, (Variable, CondVariable)): + yield from unify_var(y, x, s, **fns) + elif isinstance(x, Compound) and isinstance(y, Compound): + is_commutative = fns.get('is_commutative', lambda x: False) + is_associative = fns.get('is_associative', lambda x: False) + for sop in unify(x.op, y.op, s, **fns): + if is_associative(x) and is_associative(y): + a, b = (x, y) if len(x.args) < len(y.args) else (y, x) + if is_commutative(x) and is_commutative(y): + combs = allcombinations(a.args, b.args, 'commutative') + else: + combs = allcombinations(a.args, b.args, 'associative') + for aaargs, bbargs in combs: + aa = [unpack(Compound(a.op, arg)) for arg in aaargs] + bb = [unpack(Compound(b.op, arg)) for arg in bbargs] + yield from unify(aa, bb, sop, **fns) + elif len(x.args) == len(y.args): + yield from unify(x.args, y.args, sop, **fns) + + elif is_args(x) and is_args(y) and len(x) == len(y): + if len(x) == 0: + yield s + else: + for shead in unify(x[0], y[0], s, **fns): + yield from unify(x[1:], y[1:], shead, **fns) + +def unify_var(var, x, s, **fns): + if var in s: + yield from unify(s[var], x, s, **fns) + elif occur_check(var, x): + pass + elif isinstance(var, CondVariable) and var.valid(x): + yield assoc(s, var, x) + elif isinstance(var, Variable): + yield assoc(s, var, x) + +def occur_check(var, x): + """ var occurs in subtree owned by x? """ + if var == x: + return True + elif isinstance(x, Compound): + return occur_check(var, x.args) + elif is_args(x): + if any(occur_check(var, xi) for xi in x): return True + return False + +def assoc(d, key, val): + """ Return copy of d with key associated to val """ + d = d.copy() + d[key] = val + return d + +def is_args(x): + """ Is x a traditional iterable? """ + return type(x) in (tuple, list, set) + +def unpack(x): + if isinstance(x, Compound) and len(x.args) == 1: + return x.args[0] + else: + return x + +def allcombinations(A, B, ordered): + """ + Restructure A and B to have the same number of elements. + + Parameters + ========== + + ordered must be either 'commutative' or 'associative'. + + A and B can be rearranged so that the larger of the two lists is + reorganized into smaller sublists. + + Examples + ======== + + >>> from sympy.unify.core import allcombinations + >>> for x in allcombinations((1, 2, 3), (5, 6), 'associative'): print(x) + (((1,), (2, 3)), ((5,), (6,))) + (((1, 2), (3,)), ((5,), (6,))) + + >>> for x in allcombinations((1, 2, 3), (5, 6), 'commutative'): print(x) + (((1,), (2, 3)), ((5,), (6,))) + (((1, 2), (3,)), ((5,), (6,))) + (((1,), (3, 2)), ((5,), (6,))) + (((1, 3), (2,)), ((5,), (6,))) + (((2,), (1, 3)), ((5,), (6,))) + (((2, 1), (3,)), ((5,), (6,))) + (((2,), (3, 1)), ((5,), (6,))) + (((2, 3), (1,)), ((5,), (6,))) + (((3,), (1, 2)), ((5,), (6,))) + (((3, 1), (2,)), ((5,), (6,))) + (((3,), (2, 1)), ((5,), (6,))) + (((3, 2), (1,)), ((5,), (6,))) + """ + + if ordered == "commutative": + ordered = 11 + if ordered == "associative": + ordered = None + sm, bg = (A, B) if len(A) < len(B) else (B, A) + for part in kbins(list(range(len(bg))), len(sm), ordered=ordered): + if bg == B: + yield tuple((a,) for a in A), partition(B, part) + else: + yield partition(A, part), tuple((b,) for b in B) + +def partition(it, part): + """ Partition a tuple/list into pieces defined by indices. + + Examples + ======== + + >>> from sympy.unify.core import partition + >>> partition((10, 20, 30, 40), [[0, 1, 2], [3]]) + ((10, 20, 30), (40,)) + """ + return type(it)([index(it, ind) for ind in part]) + +def index(it, ind): + """ Fancy indexing into an indexable iterable (tuple, list). + + Examples + ======== + + >>> from sympy.unify.core import index + >>> index([10, 20, 30], (1, 2, 0)) + [20, 30, 10] + """ + return type(it)([it[i] for i in ind]) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/rewrite.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/rewrite.py new file mode 100644 index 0000000000000000000000000000000000000000..95a6fa5ffd6a3fde94d17ee845c03bb2b44cf009 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/rewrite.py @@ -0,0 +1,55 @@ +""" Functions to support rewriting of SymPy expressions """ + +from sympy.core.expr import Expr +from sympy.assumptions import ask +from sympy.strategies.tools import subs +from sympy.unify.usympy import rebuild, unify + +def rewriterule(source, target, variables=(), condition=None, assume=None): + """ Rewrite rule. + + Transform expressions that match source into expressions that match target + treating all ``variables`` as wilds. + + Examples + ======== + + >>> from sympy.abc import w, x, y, z + >>> from sympy.unify.rewrite import rewriterule + >>> from sympy import default_sort_key + >>> rl = rewriterule(x + y, x**y, [x, y]) + >>> sorted(rl(z + 3), key=default_sort_key) + [3**z, z**3] + + Use ``condition`` to specify additional requirements. Inputs are taken in + the same order as is found in variables. + + >>> rl = rewriterule(x + y, x**y, [x, y], lambda x, y: x.is_integer) + >>> list(rl(z + 3)) + [3**z] + + Use ``assume`` to specify additional requirements using new assumptions. + + >>> from sympy.assumptions import Q + >>> rl = rewriterule(x + y, x**y, [x, y], assume=Q.integer(x)) + >>> list(rl(z + 3)) + [3**z] + + Assumptions for the local context are provided at rule runtime + + >>> list(rl(w + z, Q.integer(z))) + [z**w] + """ + + def rewrite_rl(expr, assumptions=True): + for match in unify(source, expr, {}, variables=variables): + if (condition and + not condition(*[match.get(var, var) for var in variables])): + continue + if (assume and not ask(assume.xreplace(match), assumptions)): + continue + expr2 = subs(match)(target) + if isinstance(expr2, Expr): + expr2 = rebuild(expr2) + yield expr2 + return rewrite_rl diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_rewrite.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_rewrite.py new file mode 100644 index 0000000000000000000000000000000000000000..7b73e2856d5f6380c576220fa2780324df98091a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_rewrite.py @@ -0,0 +1,74 @@ +from sympy.unify.rewrite import rewriterule +from sympy.core.basic import Basic +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.trigonometric import sin +from sympy.abc import x, y +from sympy.strategies.rl import rebuild +from sympy.assumptions import Q + +p, q = Symbol('p'), Symbol('q') + +def test_simple(): + rl = rewriterule(Basic(p, S(1)), Basic(p, S(2)), variables=(p,)) + assert list(rl(Basic(S(3), S(1)))) == [Basic(S(3), S(2))] + + p1 = p**2 + p2 = p**3 + rl = rewriterule(p1, p2, variables=(p,)) + + expr = x**2 + assert list(rl(expr)) == [x**3] + +def test_simple_variables(): + rl = rewriterule(Basic(x, S(1)), Basic(x, S(2)), variables=(x,)) + assert list(rl(Basic(S(3), S(1)))) == [Basic(S(3), S(2))] + + rl = rewriterule(x**2, x**3, variables=(x,)) + assert list(rl(y**2)) == [y**3] + +def test_moderate(): + p1 = p**2 + q**3 + p2 = (p*q)**4 + rl = rewriterule(p1, p2, (p, q)) + + expr = x**2 + y**3 + assert list(rl(expr)) == [(x*y)**4] + +def test_sincos(): + p1 = sin(p)**2 + sin(p)**2 + p2 = 1 + rl = rewriterule(p1, p2, (p, q)) + + assert list(rl(sin(x)**2 + sin(x)**2)) == [1] + assert list(rl(sin(y)**2 + sin(y)**2)) == [1] + +def test_Exprs_ok(): + rl = rewriterule(p+q, q+p, (p, q)) + next(rl(x+y)).is_commutative + str(next(rl(x+y))) + +def test_condition_simple(): + rl = rewriterule(x, x+1, [x], lambda x: x < 10) + assert not list(rl(S(15))) + assert rebuild(next(rl(S(5)))) == 6 + + +def test_condition_multiple(): + rl = rewriterule(x + y, x**y, [x,y], lambda x, y: x.is_integer) + + a = Symbol('a') + b = Symbol('b', integer=True) + expr = a + b + assert list(rl(expr)) == [b**a] + + c = Symbol('c', integer=True) + d = Symbol('d', integer=True) + assert set(rl(c + d)) == {c**d, d**c} + +def test_assumptions(): + rl = rewriterule(x + y, x**y, [x, y], assume=Q.integer(x)) + + a, b = map(Symbol, 'ab') + expr = a + b + assert list(rl(expr, Q.integer(b))) == [b**a] diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_sympy.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_sympy.py new file mode 100644 index 0000000000000000000000000000000000000000..eca3933a91abfabdbad96f626e4da761a41b3fd2 --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_sympy.py @@ -0,0 +1,162 @@ +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.logic.boolalg import And +from sympy.core.symbol import Str +from sympy.unify.core import Compound, Variable +from sympy.unify.usympy import (deconstruct, construct, unify, is_associative, + is_commutative) +from sympy.abc import x, y, z, n + +def test_deconstruct(): + expr = Basic(S(1), S(2), S(3)) + expected = Compound(Basic, (1, 2, 3)) + assert deconstruct(expr) == expected + + assert deconstruct(1) == 1 + assert deconstruct(x) == x + assert deconstruct(x, variables=(x,)) == Variable(x) + assert deconstruct(Add(1, x, evaluate=False)) == Compound(Add, (1, x)) + assert deconstruct(Add(1, x, evaluate=False), variables=(x,)) == \ + Compound(Add, (1, Variable(x))) + +def test_construct(): + expr = Compound(Basic, (S(1), S(2), S(3))) + expected = Basic(S(1), S(2), S(3)) + assert construct(expr) == expected + +def test_nested(): + expr = Basic(S(1), Basic(S(2)), S(3)) + cmpd = Compound(Basic, (S(1), Compound(Basic, Tuple(2)), S(3))) + assert deconstruct(expr) == cmpd + assert construct(cmpd) == expr + +def test_unify(): + expr = Basic(S(1), S(2), S(3)) + a, b, c = map(Symbol, 'abc') + pattern = Basic(a, b, c) + assert list(unify(expr, pattern, {}, (a, b, c))) == [{a: 1, b: 2, c: 3}] + assert list(unify(expr, pattern, variables=(a, b, c))) == \ + [{a: 1, b: 2, c: 3}] + +def test_unify_variables(): + assert list(unify(Basic(S(1), S(2)), Basic(S(1), x), {}, variables=(x,))) == [{x: 2}] + +def test_s_input(): + expr = Basic(S(1), S(2)) + a, b = map(Symbol, 'ab') + pattern = Basic(a, b) + assert list(unify(expr, pattern, {}, (a, b))) == [{a: 1, b: 2}] + assert list(unify(expr, pattern, {a: 5}, (a, b))) == [] + +def iterdicteq(a, b): + a = tuple(a) + b = tuple(b) + return len(a) == len(b) and all(x in b for x in a) + +def test_unify_commutative(): + expr = Add(1, 2, 3, evaluate=False) + a, b, c = map(Symbol, 'abc') + pattern = Add(a, b, c, evaluate=False) + + result = tuple(unify(expr, pattern, {}, (a, b, c))) + expected = ({a: 1, b: 2, c: 3}, + {a: 1, b: 3, c: 2}, + {a: 2, b: 1, c: 3}, + {a: 2, b: 3, c: 1}, + {a: 3, b: 1, c: 2}, + {a: 3, b: 2, c: 1}) + + assert iterdicteq(result, expected) + +def test_unify_iter(): + expr = Add(1, 2, 3, evaluate=False) + a, b, c = map(Symbol, 'abc') + pattern = Add(a, c, evaluate=False) + assert is_associative(deconstruct(pattern)) + assert is_commutative(deconstruct(pattern)) + + result = list(unify(expr, pattern, {}, (a, c))) + expected = [{a: 1, c: Add(2, 3, evaluate=False)}, + {a: 1, c: Add(3, 2, evaluate=False)}, + {a: 2, c: Add(1, 3, evaluate=False)}, + {a: 2, c: Add(3, 1, evaluate=False)}, + {a: 3, c: Add(1, 2, evaluate=False)}, + {a: 3, c: Add(2, 1, evaluate=False)}, + {a: Add(1, 2, evaluate=False), c: 3}, + {a: Add(2, 1, evaluate=False), c: 3}, + {a: Add(1, 3, evaluate=False), c: 2}, + {a: Add(3, 1, evaluate=False), c: 2}, + {a: Add(2, 3, evaluate=False), c: 1}, + {a: Add(3, 2, evaluate=False), c: 1}] + + assert iterdicteq(result, expected) + +def test_hard_match(): + from sympy.functions.elementary.trigonometric import (cos, sin) + expr = sin(x) + cos(x)**2 + p, q = map(Symbol, 'pq') + pattern = sin(p) + cos(p)**2 + assert list(unify(expr, pattern, {}, (p, q))) == [{p: x}] + +def test_matrix(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', 2, 2) + Z = MatrixSymbol('Z', 2, 3) + assert list(unify(X, Y, {}, variables=[n, Str('X')])) == [{Str('X'): Str('Y'), n: 2}] + assert list(unify(X, Z, {}, variables=[n, Str('X')])) == [] + +def test_non_frankenAdds(): + # the is_commutative property used to fail because of Basic.__new__ + # This caused is_commutative and str calls to fail + expr = x+y*2 + rebuilt = construct(deconstruct(expr)) + # Ensure that we can run these commands without causing an error + str(rebuilt) + rebuilt.is_commutative + +def test_FiniteSet_commutivity(): + from sympy.sets.sets import FiniteSet + a, b, c, x, y = symbols('a,b,c,x,y') + s = FiniteSet(a, b, c) + t = FiniteSet(x, y) + variables = (x, y) + assert {x: FiniteSet(a, c), y: b} in tuple(unify(s, t, variables=variables)) + +def test_FiniteSet_complex(): + from sympy.sets.sets import FiniteSet + a, b, c, x, y, z = symbols('a,b,c,x,y,z') + expr = FiniteSet(Basic(S(1), x), y, Basic(x, z)) + pattern = FiniteSet(a, Basic(x, b)) + variables = a, b + expected = ({b: 1, a: FiniteSet(y, Basic(x, z))}, + {b: z, a: FiniteSet(y, Basic(S(1), x))}) + assert iterdicteq(unify(expr, pattern, variables=variables), expected) + + +def test_and(): + variables = x, y + expected = ({x: z > 0, y: n < 3},) + assert iterdicteq(unify((z>0) & (n<3), And(x, y), variables=variables), + expected) + +def test_Union(): + from sympy.sets.sets import Interval + assert list(unify(Interval(0, 1) + Interval(10, 11), + Interval(0, 1) + Interval(12, 13), + variables=(Interval(12, 13),))) + +def test_is_commutative(): + assert is_commutative(deconstruct(x+y)) + assert is_commutative(deconstruct(x*y)) + assert not is_commutative(deconstruct(x**y)) + +def test_commutative_in_commutative(): + from sympy.abc import a,b,c,d + from sympy.functions.elementary.trigonometric import (cos, sin) + eq = sin(3)*sin(4)*sin(5) + 4*cos(3)*cos(4) + pat = a*cos(b)*cos(c) + d*sin(b)*sin(c) + assert next(unify(eq, pat, variables=(a,b,c,d))) diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_unify.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_unify.py new file mode 100644 index 0000000000000000000000000000000000000000..31153242576e1ff55dd3097efbc985aced5d574a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/tests/test_unify.py @@ -0,0 +1,88 @@ +from sympy.unify.core import Compound, Variable, CondVariable, allcombinations +from sympy.unify import core + +a,b,c = 'a', 'b', 'c' +w,x,y,z = map(Variable, 'wxyz') + +C = Compound + +def is_associative(x): + return isinstance(x, Compound) and (x.op in ('Add', 'Mul', 'CAdd', 'CMul')) +def is_commutative(x): + return isinstance(x, Compound) and (x.op in ('CAdd', 'CMul')) + + +def unify(a, b, s={}): + return core.unify(a, b, s=s, is_associative=is_associative, + is_commutative=is_commutative) + +def test_basic(): + assert list(unify(a, x, {})) == [{x: a}] + assert list(unify(a, x, {x: 10})) == [] + assert list(unify(1, x, {})) == [{x: 1}] + assert list(unify(a, a, {})) == [{}] + assert list(unify((w, x), (y, z), {})) == [{w: y, x: z}] + assert list(unify(x, (a, b), {})) == [{x: (a, b)}] + + assert list(unify((a, b), (x, x), {})) == [] + assert list(unify((y, z), (x, x), {}))!= [] + assert list(unify((a, (b, c)), (a, (x, y)), {})) == [{x: b, y: c}] + +def test_ops(): + assert list(unify(C('Add', (a,b,c)), C('Add', (a,x,y)), {})) == \ + [{x:b, y:c}] + assert list(unify(C('Add', (C('Mul', (1,2)), b,c)), C('Add', (x,y,c)), {})) == \ + [{x: C('Mul', (1,2)), y:b}] + +def test_associative(): + c1 = C('Add', (1,2,3)) + c2 = C('Add', (x,y)) + assert tuple(unify(c1, c2, {})) == ({x: 1, y: C('Add', (2, 3))}, + {x: C('Add', (1, 2)), y: 3}) + +def test_commutative(): + c1 = C('CAdd', (1,2,3)) + c2 = C('CAdd', (x,y)) + result = list(unify(c1, c2, {})) + assert {x: 1, y: C('CAdd', (2, 3))} in result + assert ({x: 2, y: C('CAdd', (1, 3))} in result or + {x: 2, y: C('CAdd', (3, 1))} in result) + +def _test_combinations_assoc(): + assert set(allcombinations((1,2,3), (a,b), True)) == \ + {(((1, 2), (3,)), (a, b)), (((1,), (2, 3)), (a, b))} + +def _test_combinations_comm(): + assert set(allcombinations((1,2,3), (a,b), None)) == \ + {(((1,), (2, 3)), ('a', 'b')), (((2,), (3, 1)), ('a', 'b')), + (((3,), (1, 2)), ('a', 'b')), (((1, 2), (3,)), ('a', 'b')), + (((2, 3), (1,)), ('a', 'b')), (((3, 1), (2,)), ('a', 'b'))} + +def test_allcombinations(): + assert set(allcombinations((1,2), (1,2), 'commutative')) ==\ + {(((1,),(2,)), ((1,),(2,))), (((1,),(2,)), ((2,),(1,)))} + + +def test_commutativity(): + c1 = Compound('CAdd', (a, b)) + c2 = Compound('CAdd', (x, y)) + assert is_commutative(c1) and is_commutative(c2) + assert len(list(unify(c1, c2, {}))) == 2 + + +def test_CondVariable(): + expr = C('CAdd', (1, 2)) + x = Variable('x') + y = CondVariable('y', lambda a: a % 2 == 0) + z = CondVariable('z', lambda a: a > 3) + pattern = C('CAdd', (x, y)) + assert list(unify(expr, pattern, {})) == \ + [{x: 1, y: 2}] + + z = CondVariable('z', lambda a: a > 3) + pattern = C('CAdd', (z, y)) + + assert list(unify(expr, pattern, {})) == [] + +def test_defaultdict(): + assert next(unify(Variable('x'), 'foo')) == {Variable('x'): 'foo'} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/usympy.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/usympy.py new file mode 100644 index 0000000000000000000000000000000000000000..3942b35ec549e5dbd08a3cf1cad2b2ecea733c7a --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/unify/usympy.py @@ -0,0 +1,124 @@ +""" SymPy interface to Unification engine + +See sympy.unify for module level docstring +See sympy.unify.core for algorithmic docstring """ + +from sympy.core import Basic, Add, Mul, Pow +from sympy.core.operations import AssocOp, LatticeOp +from sympy.matrices import MatAdd, MatMul, MatrixExpr +from sympy.sets.sets import Union, Intersection, FiniteSet +from sympy.unify.core import Compound, Variable, CondVariable +from sympy.unify import core + +basic_new_legal = [MatrixExpr] +eval_false_legal = [AssocOp, Pow, FiniteSet] +illegal = [LatticeOp] + +def sympy_associative(op): + assoc_ops = (AssocOp, MatAdd, MatMul, Union, Intersection, FiniteSet) + return any(issubclass(op, aop) for aop in assoc_ops) + +def sympy_commutative(op): + comm_ops = (Add, MatAdd, Union, Intersection, FiniteSet) + return any(issubclass(op, cop) for cop in comm_ops) + +def is_associative(x): + return isinstance(x, Compound) and sympy_associative(x.op) + +def is_commutative(x): + if not isinstance(x, Compound): + return False + if sympy_commutative(x.op): + return True + if issubclass(x.op, Mul): + return all(construct(arg).is_commutative for arg in x.args) + +def mk_matchtype(typ): + def matchtype(x): + return (isinstance(x, typ) or + isinstance(x, Compound) and issubclass(x.op, typ)) + return matchtype + +def deconstruct(s, variables=()): + """ Turn a SymPy object into a Compound """ + if s in variables: + return Variable(s) + if isinstance(s, (Variable, CondVariable)): + return s + if not isinstance(s, Basic) or s.is_Atom: + return s + return Compound(s.__class__, + tuple(deconstruct(arg, variables) for arg in s.args)) + +def construct(t): + """ Turn a Compound into a SymPy object """ + if isinstance(t, (Variable, CondVariable)): + return t.arg + if not isinstance(t, Compound): + return t + if any(issubclass(t.op, cls) for cls in eval_false_legal): + return t.op(*map(construct, t.args), evaluate=False) + elif any(issubclass(t.op, cls) for cls in basic_new_legal): + return Basic.__new__(t.op, *map(construct, t.args)) + else: + return t.op(*map(construct, t.args)) + +def rebuild(s): + """ Rebuild a SymPy expression. + + This removes harm caused by Expr-Rules interactions. + """ + return construct(deconstruct(s)) + +def unify(x, y, s=None, variables=(), **kwargs): + """ Structural unification of two expressions/patterns. + + Examples + ======== + + >>> from sympy.unify.usympy import unify + >>> from sympy import Basic, S + >>> from sympy.abc import x, y, z, p, q + + >>> next(unify(Basic(S(1), S(2)), Basic(S(1), x), variables=[x])) + {x: 2} + + >>> expr = 2*x + y + z + >>> pattern = 2*p + q + >>> next(unify(expr, pattern, {}, variables=(p, q))) + {p: x, q: y + z} + + Unification supports commutative and associative matching + + >>> expr = x + y + z + >>> pattern = p + q + >>> len(list(unify(expr, pattern, {}, variables=(p, q)))) + 12 + + Symbols not indicated to be variables are treated as literal, + else they are wild-like and match anything in a sub-expression. + + >>> expr = x*y*z + 3 + >>> pattern = x*y + 3 + >>> next(unify(expr, pattern, {}, variables=[x, y])) + {x: y, y: x*z} + + The x and y of the pattern above were in a Mul and matched factors + in the Mul of expr. Here, a single symbol matches an entire term: + + >>> expr = x*y + 3 + >>> pattern = p + 3 + >>> next(unify(expr, pattern, {}, variables=[p])) + {p: x*y} + + """ + decons = lambda x: deconstruct(x, variables) + s = s or {} + s = {decons(k): decons(v) for k, v in s.items()} + + ds = core.unify(decons(x), decons(y), s, + is_associative=is_associative, + is_commutative=is_commutative, + **kwargs) + for d in ds: + yield {construct(k): construct(v) for k, v in d.items()} diff --git a/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/utilities/__init__.py b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/utilities/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8f35da4a84396618a33a12c3c6b5cf58e9d4742c --- /dev/null +++ b/Scripts_Climate_to_LAI/.venv/lib/python3.10/site-packages/sympy/utilities/__init__.py @@ -0,0 +1,30 @@ +"""This module contains some general purpose utilities that are used across +SymPy. +""" +from .iterables import (flatten, group, take, subsets, + variations, numbered_symbols, cartes, capture, dict_merge, + prefixes, postfixes, sift, topological_sort, unflatten, + has_dups, has_variety, reshape, rotations) + +from .misc import filldedent + +from .lambdify import lambdify + +from .decorator import threaded, xthreaded, public, memoize_property + +from .timeutils import timed + +__all__ = [ + 'flatten', 'group', 'take', 'subsets', 'variations', 'numbered_symbols', + 'cartes', 'capture', 'dict_merge', 'prefixes', 'postfixes', 'sift', + 'topological_sort', 'unflatten', 'has_dups', 'has_variety', 'reshape', + 'rotations', + + 'filldedent', + + 'lambdify', + + 'threaded', 'xthreaded', 'public', 'memoize_property', + + 'timed', +]